Split (1)

train · 21.9k rows

Context stringlengths 57 85k	file_name stringlengths 21 79	start int64 14 2.42k	end int64 18 2.43k	theorem stringlengths 25 2.71k	proof stringlengths 5 10.6k
import Mathlib.Algebra.Category.Ring.FilteredColimits import Mathlib.Geometry.RingedSpace.SheafedSpace import Mathlib.Topology.Sheaves.Stalks import Mathlib.Algebra.Category.Ring.Colimits import Mathlib.Algebra.Category.Ring.Limits #align_import algebraic_geometry.ringed_space from "leanprover-community/mathlib"@"5dc6092d09e5e489106865241986f7f2ad28d4c8" universe v u open CategoryTheory open TopologicalSpace open Opposite open TopCat open TopCat.Presheaf namespace AlgebraicGeometry abbrev RingedSpace : TypeMax.{u+1, v+1} := SheafedSpace.{_, v, u} CommRingCat.{v} set_option linter.uppercaseLean3 false in #align algebraic_geometry.RingedSpace AlgebraicGeometry.RingedSpace namespace RingedSpace open SheafedSpace variable (X : RingedSpace) -- Porting note (#10670): this was not necessary in mathlib3 instance : CoeSort RingedSpace Type* where coe X := X.carrier theorem isUnit_res_of_isUnit_germ (U : Opens X) (f : X.presheaf.obj (op U)) (x : U) (h : IsUnit (X.presheaf.germ x f)) : ∃ (V : Opens X) (i : V ⟶ U) (_ : x.1 ∈ V), IsUnit (X.presheaf.map i.op f) := by obtain ⟨g', heq⟩ := h.exists_right_inv obtain ⟨V, hxV, g, rfl⟩ := X.presheaf.germ_exist x.1 g' let W := U ⊓ V have hxW : x.1 ∈ W := ⟨x.2, hxV⟩ -- Porting note: `erw` can't write into `HEq`, so this is replaced with another `HEq` in the -- desired form replace heq : (X.presheaf.germ ⟨x.val, hxW⟩) ((X.presheaf.map (U.infLELeft V).op) f * (X.presheaf.map (U.infLERight V).op) g) = (X.presheaf.germ ⟨x.val, hxW⟩) 1 := by dsimp [germ] erw [map_mul, map_one, show X.presheaf.germ ⟨x, hxW⟩ ((X.presheaf.map (U.infLELeft V).op) f) = X.presheaf.germ x f from X.presheaf.germ_res_apply (Opens.infLELeft U V) ⟨x.1, hxW⟩ f, show X.presheaf.germ ⟨x, hxW⟩ (X.presheaf.map (U.infLERight V).op g) = X.presheaf.germ ⟨x, hxV⟩ g from X.presheaf.germ_res_apply (Opens.infLERight U V) ⟨x.1, hxW⟩ g] exact heq obtain ⟨W', hxW', i₁, i₂, heq'⟩ := X.presheaf.germ_eq x.1 hxW hxW _ _ heq use W', i₁ ≫ Opens.infLELeft U V, hxW' rw [(X.presheaf.map i₂.op).map_one, (X.presheaf.map i₁.op).map_mul] at heq' rw [← comp_apply, ← X.presheaf.map_comp, ← comp_apply, ← X.presheaf.map_comp, ← op_comp] at heq' exact isUnit_of_mul_eq_one _ _ heq' set_option linter.uppercaseLean3 false in #align algebraic_geometry.RingedSpace.is_unit_res_of_is_unit_germ AlgebraicGeometry.RingedSpace.isUnit_res_of_isUnit_germ theorem isUnit_of_isUnit_germ (U : Opens X) (f : X.presheaf.obj (op U)) (h : ∀ x : U, IsUnit (X.presheaf.germ x f)) : IsUnit f := by -- We pick a cover of `U` by open sets `V x`, such that `f` is a unit on each `V x`. choose V iVU m h_unit using fun x : U => X.isUnit_res_of_isUnit_germ U f x (h x) have hcover : U ≤ iSup V := by intro x hxU -- Porting note: in Lean3 `rw` is sufficient erw [Opens.mem_iSup] exact ⟨⟨x, hxU⟩, m ⟨x, hxU⟩⟩ -- Let `g x` denote the inverse of `f` in `U x`. choose g hg using fun x : U => IsUnit.exists_right_inv (h_unit x) have ic : IsCompatible (sheaf X).val V g := by intro x y apply section_ext X.sheaf (V x ⊓ V y) rintro ⟨z, hzVx, hzVy⟩ erw [germ_res_apply, germ_res_apply] apply (IsUnit.mul_right_inj (h ⟨z, (iVU x).le hzVx⟩)).mp -- Porting note: now need explicitly typing the rewrites rw [← show X.presheaf.germ ⟨z, hzVx⟩ (X.presheaf.map (iVU x).op f) = X.presheaf.germ ⟨z, ((iVU x) ⟨z, hzVx⟩).2⟩ f from X.presheaf.germ_res_apply (iVU x) ⟨z, hzVx⟩ f] -- Porting note: change was not necessary in Lean3 change X.presheaf.germ ⟨z, hzVx⟩ _ * (X.presheaf.germ ⟨z, hzVx⟩ _) = X.presheaf.germ ⟨z, hzVx⟩ _ * X.presheaf.germ ⟨z, hzVy⟩ (g y) rw [← RingHom.map_mul, congr_arg (X.presheaf.germ (⟨z, hzVx⟩ : V x)) (hg x), -- Porting note: now need explicitly typing the rewrites show X.presheaf.germ ⟨z, hzVx⟩ (X.presheaf.map (iVU x).op f) = X.presheaf.germ ⟨z, ((iVU x) ⟨z, hzVx⟩).2⟩ f from X.presheaf.germ_res_apply _ _ f, -- Porting note: now need explicitly typing the rewrites ← show X.presheaf.germ ⟨z, hzVy⟩ (X.presheaf.map (iVU y).op f) = X.presheaf.germ ⟨z, ((iVU x) ⟨z, hzVx⟩).2⟩ f from X.presheaf.germ_res_apply (iVU y) ⟨z, hzVy⟩ f, ← RingHom.map_mul, congr_arg (X.presheaf.germ (⟨z, hzVy⟩ : V y)) (hg y), RingHom.map_one, RingHom.map_one] -- We claim that these local inverses glue together to a global inverse of `f`. obtain ⟨gl, gl_spec, -⟩ := X.sheaf.existsUnique_gluing' V U iVU hcover g ic apply isUnit_of_mul_eq_one f gl apply X.sheaf.eq_of_locally_eq' V U iVU hcover intro i rw [RingHom.map_one, RingHom.map_mul, gl_spec] exact hg i set_option linter.uppercaseLean3 false in #align algebraic_geometry.RingedSpace.is_unit_of_is_unit_germ AlgebraicGeometry.RingedSpace.isUnit_of_isUnit_germ def basicOpen {U : Opens X} (f : X.presheaf.obj (op U)) : Opens X where -- Porting note: `coe` does not work carrier := Subtype.val '' { x : U \| IsUnit (X.presheaf.germ x f) } is_open' := by rw [isOpen_iff_forall_mem_open] rintro _ ⟨x, hx, rfl⟩ obtain ⟨V, i, hxV, hf⟩ := X.isUnit_res_of_isUnit_germ U f x hx use V.1 refine ⟨?_, V.2, hxV⟩ intro y hy use (⟨y, i.le hy⟩ : U) rw [Set.mem_setOf_eq] constructor · convert RingHom.isUnit_map (X.presheaf.germ ⟨y, hy⟩) hf exact (X.presheaf.germ_res_apply i ⟨y, hy⟩ f).symm · rfl set_option linter.uppercaseLean3 false in #align algebraic_geometry.RingedSpace.basic_open AlgebraicGeometry.RingedSpace.basicOpen @[simp] theorem mem_basicOpen {U : Opens X} (f : X.presheaf.obj (op U)) (x : U) : ↑x ∈ X.basicOpen f ↔ IsUnit (X.presheaf.germ x f) := by constructor · rintro ⟨x, hx, a⟩; cases Subtype.eq a; exact hx · intro h; exact ⟨x, h, rfl⟩ set_option linter.uppercaseLean3 false in #align algebraic_geometry.RingedSpace.mem_basic_open AlgebraicGeometry.RingedSpace.mem_basicOpen @[simp] theorem mem_top_basicOpen (f : X.presheaf.obj (op ⊤)) (x : X) : x ∈ X.basicOpen f ↔ IsUnit (X.presheaf.germ ⟨x, show x ∈ (⊤ : Opens X) by trivial⟩ f) := mem_basicOpen X f ⟨x, _⟩ set_option linter.uppercaseLean3 false in #align algebraic_geometry.RingedSpace.mem_top_basic_open AlgebraicGeometry.RingedSpace.mem_top_basicOpen	Mathlib/Geometry/RingedSpace/Basic.lean	167	168	theorem basicOpen_le {U : Opens X} (f : X.presheaf.obj (op U)) : X.basicOpen f ≤ U := by	rintro _ ⟨x, _, rfl⟩; exact x.2
import Mathlib.Analysis.Calculus.Deriv.Basic import Mathlib.LinearAlgebra.AffineSpace.Slope #align_import analysis.calculus.deriv.slope from "leanprover-community/mathlib"@"3bce8d800a6f2b8f63fe1e588fd76a9ff4adcebe" universe u v w noncomputable section open Topology Filter TopologicalSpace open Filter Set section NormedField variable {𝕜 : Type u} [NontriviallyNormedField 𝕜] variable {F : Type v} [NormedAddCommGroup F] [NormedSpace 𝕜 F] variable {E : Type w} [NormedAddCommGroup E] [NormedSpace 𝕜 E] variable {f f₀ f₁ g : 𝕜 → F} variable {f' f₀' f₁' g' : F} variable {x : 𝕜} variable {s t : Set 𝕜} variable {L L₁ L₂ : Filter 𝕜}	Mathlib/Analysis/Calculus/Deriv/Slope.lean	51	63	theorem hasDerivAtFilter_iff_tendsto_slope {x : 𝕜} {L : Filter 𝕜} : HasDerivAtFilter f f' x L ↔ Tendsto (slope f x) (L ⊓ 𝓟 {x}ᶜ) (𝓝 f') := calc HasDerivAtFilter f f' x L ↔ Tendsto (fun y ↦ slope f x y - (y - x)⁻¹ • (y - x) • f') L (𝓝 0) := by	simp only [hasDerivAtFilter_iff_tendsto, ← norm_inv, ← norm_smul, ← tendsto_zero_iff_norm_tendsto_zero, slope_def_module, smul_sub] _ ↔ Tendsto (fun y ↦ slope f x y - (y - x)⁻¹ • (y - x) • f') (L ⊓ 𝓟 {x}ᶜ) (𝓝 0) := .symm <\| tendsto_inf_principal_nhds_iff_of_forall_eq <\| by simp _ ↔ Tendsto (fun y ↦ slope f x y - f') (L ⊓ 𝓟 {x}ᶜ) (𝓝 0) := tendsto_congr' <\| by refine (EqOn.eventuallyEq fun y hy ↦ ?_).filter_mono inf_le_right rw [inv_smul_smul₀ (sub_ne_zero.2 hy) f'] _ ↔ Tendsto (slope f x) (L ⊓ 𝓟 {x}ᶜ) (𝓝 f') := by rw [← nhds_translation_sub f', tendsto_comap_iff]; rfl
import Mathlib.Algebra.Polynomial.RingDivision import Mathlib.RingTheory.Localization.FractionRing #align_import data.polynomial.ring_division from "leanprover-community/mathlib"@"8efcf8022aac8e01df8d302dcebdbc25d6a886c8" noncomputable section namespace Polynomial universe u v w z variable {R : Type u} {S : Type v} {T : Type w} {a b : R} {n : ℕ} section CommRing variable [CommRing R] [IsDomain R] {p q : R[X]} section Roots open Multiset Finset noncomputable def roots (p : R[X]) : Multiset R := haveI := Classical.decEq R haveI := Classical.dec (p = 0) if h : p = 0 then ∅ else Classical.choose (exists_multiset_roots h) #align polynomial.roots Polynomial.roots theorem roots_def [DecidableEq R] (p : R[X]) [Decidable (p = 0)] : p.roots = if h : p = 0 then ∅ else Classical.choose (exists_multiset_roots h) := by -- porting noteL `‹_›` doesn't work for instance arguments rename_i iR ip0 obtain rfl := Subsingleton.elim iR (Classical.decEq R) obtain rfl := Subsingleton.elim ip0 (Classical.dec (p = 0)) rfl #align polynomial.roots_def Polynomial.roots_def @[simp] theorem roots_zero : (0 : R[X]).roots = 0 := dif_pos rfl #align polynomial.roots_zero Polynomial.roots_zero theorem card_roots (hp0 : p ≠ 0) : (Multiset.card (roots p) : WithBot ℕ) ≤ degree p := by classical unfold roots rw [dif_neg hp0] exact (Classical.choose_spec (exists_multiset_roots hp0)).1 #align polynomial.card_roots Polynomial.card_roots theorem card_roots' (p : R[X]) : Multiset.card p.roots ≤ natDegree p := by by_cases hp0 : p = 0 · simp [hp0] exact WithBot.coe_le_coe.1 (le_trans (card_roots hp0) (le_of_eq <\| degree_eq_natDegree hp0)) #align polynomial.card_roots' Polynomial.card_roots' theorem card_roots_sub_C {p : R[X]} {a : R} (hp0 : 0 < degree p) : (Multiset.card (p - C a).roots : WithBot ℕ) ≤ degree p := calc (Multiset.card (p - C a).roots : WithBot ℕ) ≤ degree (p - C a) := card_roots <\| mt sub_eq_zero.1 fun h => not_le_of_gt hp0 <\| h.symm ▸ degree_C_le _ = degree p := by rw [sub_eq_add_neg, ← C_neg]; exact degree_add_C hp0 set_option linter.uppercaseLean3 false in #align polynomial.card_roots_sub_C Polynomial.card_roots_sub_C theorem card_roots_sub_C' {p : R[X]} {a : R} (hp0 : 0 < degree p) : Multiset.card (p - C a).roots ≤ natDegree p := WithBot.coe_le_coe.1 (le_trans (card_roots_sub_C hp0) (le_of_eq <\| degree_eq_natDegree fun h => by simp_all [lt_irrefl])) set_option linter.uppercaseLean3 false in #align polynomial.card_roots_sub_C' Polynomial.card_roots_sub_C' @[simp] theorem count_roots [DecidableEq R] (p : R[X]) : p.roots.count a = rootMultiplicity a p := by classical by_cases hp : p = 0 · simp [hp] rw [roots_def, dif_neg hp] exact (Classical.choose_spec (exists_multiset_roots hp)).2 a #align polynomial.count_roots Polynomial.count_roots @[simp] theorem mem_roots' : a ∈ p.roots ↔ p ≠ 0 ∧ IsRoot p a := by classical rw [← count_pos, count_roots p, rootMultiplicity_pos'] #align polynomial.mem_roots' Polynomial.mem_roots' theorem mem_roots (hp : p ≠ 0) : a ∈ p.roots ↔ IsRoot p a := mem_roots'.trans <\| and_iff_right hp #align polynomial.mem_roots Polynomial.mem_roots theorem ne_zero_of_mem_roots (h : a ∈ p.roots) : p ≠ 0 := (mem_roots'.1 h).1 #align polynomial.ne_zero_of_mem_roots Polynomial.ne_zero_of_mem_roots theorem isRoot_of_mem_roots (h : a ∈ p.roots) : IsRoot p a := (mem_roots'.1 h).2 #align polynomial.is_root_of_mem_roots Polynomial.isRoot_of_mem_roots -- Porting note: added during port. lemma mem_roots_iff_aeval_eq_zero {x : R} (w : p ≠ 0) : x ∈ roots p ↔ aeval x p = 0 := by rw [mem_roots w, IsRoot.def, aeval_def, eval₂_eq_eval_map] simp theorem card_le_degree_of_subset_roots {p : R[X]} {Z : Finset R} (h : Z.val ⊆ p.roots) : Z.card ≤ p.natDegree := (Multiset.card_le_card (Finset.val_le_iff_val_subset.2 h)).trans (Polynomial.card_roots' p) #align polynomial.card_le_degree_of_subset_roots Polynomial.card_le_degree_of_subset_roots theorem finite_setOf_isRoot {p : R[X]} (hp : p ≠ 0) : Set.Finite { x \| IsRoot p x } := by classical simpa only [← Finset.setOf_mem, Multiset.mem_toFinset, mem_roots hp] using p.roots.toFinset.finite_toSet #align polynomial.finite_set_of_is_root Polynomial.finite_setOf_isRoot theorem eq_zero_of_infinite_isRoot (p : R[X]) (h : Set.Infinite { x \| IsRoot p x }) : p = 0 := not_imp_comm.mp finite_setOf_isRoot h #align polynomial.eq_zero_of_infinite_is_root Polynomial.eq_zero_of_infinite_isRoot theorem exists_max_root [LinearOrder R] (p : R[X]) (hp : p ≠ 0) : ∃ x₀, ∀ x, p.IsRoot x → x ≤ x₀ := Set.exists_upper_bound_image _ _ <\| finite_setOf_isRoot hp #align polynomial.exists_max_root Polynomial.exists_max_root theorem exists_min_root [LinearOrder R] (p : R[X]) (hp : p ≠ 0) : ∃ x₀, ∀ x, p.IsRoot x → x₀ ≤ x := Set.exists_lower_bound_image _ _ <\| finite_setOf_isRoot hp #align polynomial.exists_min_root Polynomial.exists_min_root theorem eq_of_infinite_eval_eq (p q : R[X]) (h : Set.Infinite { x \| eval x p = eval x q }) : p = q := by rw [← sub_eq_zero] apply eq_zero_of_infinite_isRoot simpa only [IsRoot, eval_sub, sub_eq_zero] #align polynomial.eq_of_infinite_eval_eq Polynomial.eq_of_infinite_eval_eq theorem roots_mul {p q : R[X]} (hpq : p * q ≠ 0) : (p * q).roots = p.roots + q.roots := by classical exact Multiset.ext.mpr fun r => by rw [count_add, count_roots, count_roots, count_roots, rootMultiplicity_mul hpq] #align polynomial.roots_mul Polynomial.roots_mul theorem roots.le_of_dvd (h : q ≠ 0) : p ∣ q → roots p ≤ roots q := by rintro ⟨k, rfl⟩ exact Multiset.le_iff_exists_add.mpr ⟨k.roots, roots_mul h⟩ #align polynomial.roots.le_of_dvd Polynomial.roots.le_of_dvd theorem mem_roots_sub_C' {p : R[X]} {a x : R} : x ∈ (p - C a).roots ↔ p ≠ C a ∧ p.eval x = a := by rw [mem_roots', IsRoot.def, sub_ne_zero, eval_sub, sub_eq_zero, eval_C] set_option linter.uppercaseLean3 false in #align polynomial.mem_roots_sub_C' Polynomial.mem_roots_sub_C' theorem mem_roots_sub_C {p : R[X]} {a x : R} (hp0 : 0 < degree p) : x ∈ (p - C a).roots ↔ p.eval x = a := mem_roots_sub_C'.trans <\| and_iff_right fun hp => hp0.not_le <\| hp.symm ▸ degree_C_le set_option linter.uppercaseLean3 false in #align polynomial.mem_roots_sub_C Polynomial.mem_roots_sub_C @[simp] theorem roots_X_sub_C (r : R) : roots (X - C r) = {r} := by classical ext s rw [count_roots, rootMultiplicity_X_sub_C, count_singleton] set_option linter.uppercaseLean3 false in #align polynomial.roots_X_sub_C Polynomial.roots_X_sub_C @[simp] theorem roots_X : roots (X : R[X]) = {0} := by rw [← roots_X_sub_C, C_0, sub_zero] set_option linter.uppercaseLean3 false in #align polynomial.roots_X Polynomial.roots_X @[simp] theorem roots_C (x : R) : (C x).roots = 0 := by classical exact if H : x = 0 then by rw [H, C_0, roots_zero] else Multiset.ext.mpr fun r => (by rw [count_roots, count_zero, rootMultiplicity_eq_zero (not_isRoot_C _ _ H)]) set_option linter.uppercaseLean3 false in #align polynomial.roots_C Polynomial.roots_C @[simp] theorem roots_one : (1 : R[X]).roots = ∅ := roots_C 1 #align polynomial.roots_one Polynomial.roots_one @[simp] theorem roots_C_mul (p : R[X]) (ha : a ≠ 0) : (C a * p).roots = p.roots := by by_cases hp : p = 0 <;> simp only [roots_mul, , Ne, mul_eq_zero, C_eq_zero, or_self_iff, not_false_iff, roots_C, zero_add, mul_zero] set_option linter.uppercaseLean3 false in #align polynomial.roots_C_mul Polynomial.roots_C_mul @[simp] theorem roots_smul_nonzero (p : R[X]) (ha : a ≠ 0) : (a • p).roots = p.roots := by rw [smul_eq_C_mul, roots_C_mul _ ha] #align polynomial.roots_smul_nonzero Polynomial.roots_smul_nonzero @[simp] lemma roots_neg (p : R[X]) : (-p).roots = p.roots := by rw [← neg_one_smul R p, roots_smul_nonzero p (neg_ne_zero.mpr one_ne_zero)] theorem roots_list_prod (L : List R[X]) : (0 : R[X]) ∉ L → L.prod.roots = (L : Multiset R[X]).bind roots := List.recOn L (fun _ => roots_one) fun hd tl ih H => by rw [List.mem_cons, not_or] at H rw [List.prod_cons, roots_mul (mul_ne_zero (Ne.symm H.1) <\| List.prod_ne_zero H.2), ← Multiset.cons_coe, Multiset.cons_bind, ih H.2] #align polynomial.roots_list_prod Polynomial.roots_list_prod theorem roots_multiset_prod (m : Multiset R[X]) : (0 : R[X]) ∉ m → m.prod.roots = m.bind roots := by rcases m with ⟨L⟩ simpa only [Multiset.prod_coe, quot_mk_to_coe''] using roots_list_prod L #align polynomial.roots_multiset_prod Polynomial.roots_multiset_prod theorem roots_prod {ι : Type} (f : ι → R[X]) (s : Finset ι) : s.prod f ≠ 0 → (s.prod f).roots = s.val.bind fun i => roots (f i) := by rcases s with ⟨m, hm⟩ simpa [Multiset.prod_eq_zero_iff, Multiset.bind_map] using roots_multiset_prod (m.map f) #align polynomial.roots_prod Polynomial.roots_prod @[simp] theorem roots_pow (p : R[X]) (n : ℕ) : (p ^ n).roots = n • p.roots := by induction' n with n ihn · rw [pow_zero, roots_one, zero_smul, empty_eq_zero] · rcases eq_or_ne p 0 with (rfl \| hp) · rw [zero_pow n.succ_ne_zero, roots_zero, smul_zero] · rw [pow_succ, roots_mul (mul_ne_zero (pow_ne_zero _ hp) hp), ihn, add_smul, one_smul] #align polynomial.roots_pow Polynomial.roots_pow theorem roots_X_pow (n : ℕ) : (X ^ n : R[X]).roots = n • ({0} : Multiset R) := by rw [roots_pow, roots_X] set_option linter.uppercaseLean3 false in #align polynomial.roots_X_pow Polynomial.roots_X_pow theorem roots_C_mul_X_pow (ha : a ≠ 0) (n : ℕ) : Polynomial.roots (C a * X ^ n) = n • ({0} : Multiset R) := by rw [roots_C_mul _ ha, roots_X_pow] set_option linter.uppercaseLean3 false in #align polynomial.roots_C_mul_X_pow Polynomial.roots_C_mul_X_pow @[simp] theorem roots_monomial (ha : a ≠ 0) (n : ℕ) : (monomial n a).roots = n • ({0} : Multiset R) := by rw [← C_mul_X_pow_eq_monomial, roots_C_mul_X_pow ha] #align polynomial.roots_monomial Polynomial.roots_monomial theorem roots_prod_X_sub_C (s : Finset R) : (s.prod fun a => X - C a).roots = s.val := by apply (roots_prod (fun a => X - C a) s ?_).trans · simp_rw [roots_X_sub_C] rw [Multiset.bind_singleton, Multiset.map_id'] · refine prod_ne_zero_iff.mpr (fun a _ => X_sub_C_ne_zero a) set_option linter.uppercaseLean3 false in #align polynomial.roots_prod_X_sub_C Polynomial.roots_prod_X_sub_C @[simp] theorem roots_multiset_prod_X_sub_C (s : Multiset R) : (s.map fun a => X - C a).prod.roots = s := by rw [roots_multiset_prod, Multiset.bind_map] · simp_rw [roots_X_sub_C] rw [Multiset.bind_singleton, Multiset.map_id'] · rw [Multiset.mem_map] rintro ⟨a, -, h⟩ exact X_sub_C_ne_zero a h set_option linter.uppercaseLean3 false in #align polynomial.roots_multiset_prod_X_sub_C Polynomial.roots_multiset_prod_X_sub_C theorem card_roots_X_pow_sub_C {n : ℕ} (hn : 0 < n) (a : R) : Multiset.card (roots ((X : R[X]) ^ n - C a)) ≤ n := WithBot.coe_le_coe.1 <\| calc (Multiset.card (roots ((X : R[X]) ^ n - C a)) : WithBot ℕ) ≤ degree ((X : R[X]) ^ n - C a) := card_roots (X_pow_sub_C_ne_zero hn a) _ = n := degree_X_pow_sub_C hn a set_option linter.uppercaseLean3 false in #align polynomial.card_roots_X_pow_sub_C Polynomial.card_roots_X_pow_sub_C theorem zero_of_eval_zero [Infinite R] (p : R[X]) (h : ∀ x, p.eval x = 0) : p = 0 := by classical by_contra hp refine @Fintype.false R _ ?_ exact ⟨p.roots.toFinset, fun x => Multiset.mem_toFinset.mpr ((mem_roots hp).mpr (h _))⟩ #align polynomial.zero_of_eval_zero Polynomial.zero_of_eval_zero theorem funext [Infinite R] {p q : R[X]} (ext : ∀ r : R, p.eval r = q.eval r) : p = q := by rw [← sub_eq_zero] apply zero_of_eval_zero intro x rw [eval_sub, sub_eq_zero, ext] #align polynomial.funext Polynomial.funext variable [CommRing T] noncomputable abbrev aroots (p : T[X]) (S) [CommRing S] [IsDomain S] [Algebra T S] : Multiset S := (p.map (algebraMap T S)).roots theorem aroots_def (p : T[X]) (S) [CommRing S] [IsDomain S] [Algebra T S] : p.aroots S = (p.map (algebraMap T S)).roots := rfl theorem mem_aroots' [CommRing S] [IsDomain S] [Algebra T S] {p : T[X]} {a : S} : a ∈ p.aroots S ↔ p.map (algebraMap T S) ≠ 0 ∧ aeval a p = 0 := by rw [mem_roots', IsRoot.def, ← eval₂_eq_eval_map, aeval_def] theorem mem_aroots [CommRing S] [IsDomain S] [Algebra T S] [NoZeroSMulDivisors T S] {p : T[X]} {a : S} : a ∈ p.aroots S ↔ p ≠ 0 ∧ aeval a p = 0 := by rw [mem_aroots', Polynomial.map_ne_zero_iff] exact NoZeroSMulDivisors.algebraMap_injective T S theorem aroots_mul [CommRing S] [IsDomain S] [Algebra T S] [NoZeroSMulDivisors T S] {p q : T[X]} (hpq : p * q ≠ 0) : (p * q).aroots S = p.aroots S + q.aroots S := by suffices map (algebraMap T S) p * map (algebraMap T S) q ≠ 0 by rw [aroots_def, Polynomial.map_mul, roots_mul this] rwa [← Polynomial.map_mul, Polynomial.map_ne_zero_iff (NoZeroSMulDivisors.algebraMap_injective T S)] @[simp] theorem aroots_X_sub_C [CommRing S] [IsDomain S] [Algebra T S] (r : T) : aroots (X - C r) S = {algebraMap T S r} := by rw [aroots_def, Polynomial.map_sub, map_X, map_C, roots_X_sub_C] @[simp] theorem aroots_X [CommRing S] [IsDomain S] [Algebra T S] : aroots (X : T[X]) S = {0} := by rw [aroots_def, map_X, roots_X] @[simp] theorem aroots_C [CommRing S] [IsDomain S] [Algebra T S] (a : T) : (C a).aroots S = 0 := by rw [aroots_def, map_C, roots_C] @[simp] theorem aroots_zero (S) [CommRing S] [IsDomain S] [Algebra T S] : (0 : T[X]).aroots S = 0 := by rw [← C_0, aroots_C] @[simp] theorem aroots_one [CommRing S] [IsDomain S] [Algebra T S] : (1 : T[X]).aroots S = 0 := aroots_C 1 @[simp] theorem aroots_neg [CommRing S] [IsDomain S] [Algebra T S] (p : T[X]) : (-p).aroots S = p.aroots S := by rw [aroots, Polynomial.map_neg, roots_neg] @[simp]	Mathlib/Algebra/Polynomial/Roots.lean	466	471	theorem aroots_C_mul [CommRing S] [IsDomain S] [Algebra T S] [NoZeroSMulDivisors T S] {a : T} (p : T[X]) (ha : a ≠ 0) : (C a * p).aroots S = p.aroots S := by	rw [aroots_def, Polynomial.map_mul, map_C, roots_C_mul] rwa [map_ne_zero_iff] exact NoZeroSMulDivisors.algebraMap_injective T S
import Mathlib.Algebra.Module.BigOperators import Mathlib.Data.Fintype.BigOperators import Mathlib.LinearAlgebra.AffineSpace.AffineMap import Mathlib.LinearAlgebra.AffineSpace.AffineSubspace import Mathlib.LinearAlgebra.Finsupp import Mathlib.Tactic.FinCases #align_import linear_algebra.affine_space.combination from "leanprover-community/mathlib"@"2de9c37fa71dde2f1c6feff19876dd6a7b1519f0" noncomputable section open Affine namespace Finset variable (k : Type) {V : Type} {P : Type} [DivisionRing k] [AddCommGroup V] [Module k V] variable [AffineSpace V P] {ι : Type} (s : Finset ι) {ι₂ : Type*} (s₂ : Finset ι₂) def centroidWeights : ι → k := Function.const ι (card s : k)⁻¹ #align finset.centroid_weights Finset.centroidWeights @[simp] theorem centroidWeights_apply (i : ι) : s.centroidWeights k i = (card s : k)⁻¹ := rfl #align finset.centroid_weights_apply Finset.centroidWeights_apply theorem centroidWeights_eq_const : s.centroidWeights k = Function.const ι (card s : k)⁻¹ := rfl #align finset.centroid_weights_eq_const Finset.centroidWeights_eq_const variable {k} theorem sum_centroidWeights_eq_one_of_cast_card_ne_zero (h : (card s : k) ≠ 0) : ∑ i ∈ s, s.centroidWeights k i = 1 := by simp [h] #align finset.sum_centroid_weights_eq_one_of_cast_card_ne_zero Finset.sum_centroidWeights_eq_one_of_cast_card_ne_zero variable (k)	Mathlib/LinearAlgebra/AffineSpace/Combination.lean	804	809	theorem sum_centroidWeights_eq_one_of_card_ne_zero [CharZero k] (h : card s ≠ 0) : ∑ i ∈ s, s.centroidWeights k i = 1 := by	-- Porting note: `simp` cannot find `mul_inv_cancel` and does not use `norm_cast` simp only [centroidWeights_apply, sum_const, nsmul_eq_mul, ne_eq, Nat.cast_eq_zero, card_eq_zero] refine mul_inv_cancel ?_ norm_cast
import Mathlib.Analysis.Calculus.Deriv.Basic import Mathlib.Analysis.Calculus.ContDiff.Defs #align_import analysis.calculus.iterated_deriv from "leanprover-community/mathlib"@"3bce8d800a6f2b8f63fe1e588fd76a9ff4adcebe" noncomputable section open scoped Classical Topology open Filter Asymptotics Set variable {𝕜 : Type} [NontriviallyNormedField 𝕜] variable {F : Type} [NormedAddCommGroup F] [NormedSpace 𝕜 F] variable {E : Type*} [NormedAddCommGroup E] [NormedSpace 𝕜 E] def iteratedDeriv (n : ℕ) (f : 𝕜 → F) (x : 𝕜) : F := (iteratedFDeriv 𝕜 n f x : (Fin n → 𝕜) → F) fun _ : Fin n => 1 #align iterated_deriv iteratedDeriv def iteratedDerivWithin (n : ℕ) (f : 𝕜 → F) (s : Set 𝕜) (x : 𝕜) : F := (iteratedFDerivWithin 𝕜 n f s x : (Fin n → 𝕜) → F) fun _ : Fin n => 1 #align iterated_deriv_within iteratedDerivWithin variable {n : ℕ} {f : 𝕜 → F} {s : Set 𝕜} {x : 𝕜} theorem iteratedDerivWithin_univ : iteratedDerivWithin n f univ = iteratedDeriv n f := by ext x rw [iteratedDerivWithin, iteratedDeriv, iteratedFDerivWithin_univ] #align iterated_deriv_within_univ iteratedDerivWithin_univ theorem iteratedDerivWithin_eq_iteratedFDerivWithin : iteratedDerivWithin n f s x = (iteratedFDerivWithin 𝕜 n f s x : (Fin n → 𝕜) → F) fun _ : Fin n => 1 := rfl #align iterated_deriv_within_eq_iterated_fderiv_within iteratedDerivWithin_eq_iteratedFDerivWithin theorem iteratedDerivWithin_eq_equiv_comp : iteratedDerivWithin n f s = (ContinuousMultilinearMap.piFieldEquiv 𝕜 (Fin n) F).symm ∘ iteratedFDerivWithin 𝕜 n f s := by ext x; rfl #align iterated_deriv_within_eq_equiv_comp iteratedDerivWithin_eq_equiv_comp theorem iteratedFDerivWithin_eq_equiv_comp : iteratedFDerivWithin 𝕜 n f s = ContinuousMultilinearMap.piFieldEquiv 𝕜 (Fin n) F ∘ iteratedDerivWithin n f s := by rw [iteratedDerivWithin_eq_equiv_comp, ← Function.comp.assoc, LinearIsometryEquiv.self_comp_symm, Function.id_comp] #align iterated_fderiv_within_eq_equiv_comp iteratedFDerivWithin_eq_equiv_comp theorem iteratedFDerivWithin_apply_eq_iteratedDerivWithin_mul_prod {m : Fin n → 𝕜} : (iteratedFDerivWithin 𝕜 n f s x : (Fin n → 𝕜) → F) m = (∏ i, m i) • iteratedDerivWithin n f s x := by rw [iteratedDerivWithin_eq_iteratedFDerivWithin, ← ContinuousMultilinearMap.map_smul_univ] simp #align iterated_fderiv_within_apply_eq_iterated_deriv_within_mul_prod iteratedFDerivWithin_apply_eq_iteratedDerivWithin_mul_prod theorem norm_iteratedFDerivWithin_eq_norm_iteratedDerivWithin : ‖iteratedFDerivWithin 𝕜 n f s x‖ = ‖iteratedDerivWithin n f s x‖ := by rw [iteratedDerivWithin_eq_equiv_comp, Function.comp_apply, LinearIsometryEquiv.norm_map] #align norm_iterated_fderiv_within_eq_norm_iterated_deriv_within norm_iteratedFDerivWithin_eq_norm_iteratedDerivWithin @[simp] theorem iteratedDerivWithin_zero : iteratedDerivWithin 0 f s = f := by ext x simp [iteratedDerivWithin] #align iterated_deriv_within_zero iteratedDerivWithin_zero @[simp] theorem iteratedDerivWithin_one {x : 𝕜} (h : UniqueDiffWithinAt 𝕜 s x) : iteratedDerivWithin 1 f s x = derivWithin f s x := by simp only [iteratedDerivWithin, iteratedFDerivWithin_one_apply h]; rfl #align iterated_deriv_within_one iteratedDerivWithin_one theorem contDiffOn_of_continuousOn_differentiableOn_deriv {n : ℕ∞} (Hcont : ∀ m : ℕ, (m : ℕ∞) ≤ n → ContinuousOn (fun x => iteratedDerivWithin m f s x) s) (Hdiff : ∀ m : ℕ, (m : ℕ∞) < n → DifferentiableOn 𝕜 (fun x => iteratedDerivWithin m f s x) s) : ContDiffOn 𝕜 n f s := by apply contDiffOn_of_continuousOn_differentiableOn · simpa only [iteratedFDerivWithin_eq_equiv_comp, LinearIsometryEquiv.comp_continuousOn_iff] · simpa only [iteratedFDerivWithin_eq_equiv_comp, LinearIsometryEquiv.comp_differentiableOn_iff] #align cont_diff_on_of_continuous_on_differentiable_on_deriv contDiffOn_of_continuousOn_differentiableOn_deriv theorem contDiffOn_of_differentiableOn_deriv {n : ℕ∞} (h : ∀ m : ℕ, (m : ℕ∞) ≤ n → DifferentiableOn 𝕜 (iteratedDerivWithin m f s) s) : ContDiffOn 𝕜 n f s := by apply contDiffOn_of_differentiableOn simpa only [iteratedFDerivWithin_eq_equiv_comp, LinearIsometryEquiv.comp_differentiableOn_iff] #align cont_diff_on_of_differentiable_on_deriv contDiffOn_of_differentiableOn_deriv theorem ContDiffOn.continuousOn_iteratedDerivWithin {n : ℕ∞} {m : ℕ} (h : ContDiffOn 𝕜 n f s) (hmn : (m : ℕ∞) ≤ n) (hs : UniqueDiffOn 𝕜 s) : ContinuousOn (iteratedDerivWithin m f s) s := by simpa only [iteratedDerivWithin_eq_equiv_comp, LinearIsometryEquiv.comp_continuousOn_iff] using h.continuousOn_iteratedFDerivWithin hmn hs #align cont_diff_on.continuous_on_iterated_deriv_within ContDiffOn.continuousOn_iteratedDerivWithin theorem ContDiffWithinAt.differentiableWithinAt_iteratedDerivWithin {n : ℕ∞} {m : ℕ} (h : ContDiffWithinAt 𝕜 n f s x) (hmn : (m : ℕ∞) < n) (hs : UniqueDiffOn 𝕜 (insert x s)) : DifferentiableWithinAt 𝕜 (iteratedDerivWithin m f s) s x := by simpa only [iteratedDerivWithin_eq_equiv_comp, LinearIsometryEquiv.comp_differentiableWithinAt_iff] using h.differentiableWithinAt_iteratedFDerivWithin hmn hs #align cont_diff_within_at.differentiable_within_at_iterated_deriv_within ContDiffWithinAt.differentiableWithinAt_iteratedDerivWithin theorem ContDiffOn.differentiableOn_iteratedDerivWithin {n : ℕ∞} {m : ℕ} (h : ContDiffOn 𝕜 n f s) (hmn : (m : ℕ∞) < n) (hs : UniqueDiffOn 𝕜 s) : DifferentiableOn 𝕜 (iteratedDerivWithin m f s) s := fun x hx => (h x hx).differentiableWithinAt_iteratedDerivWithin hmn <\| by rwa [insert_eq_of_mem hx] #align cont_diff_on.differentiable_on_iterated_deriv_within ContDiffOn.differentiableOn_iteratedDerivWithin theorem contDiffOn_iff_continuousOn_differentiableOn_deriv {n : ℕ∞} (hs : UniqueDiffOn 𝕜 s) : ContDiffOn 𝕜 n f s ↔ (∀ m : ℕ, (m : ℕ∞) ≤ n → ContinuousOn (iteratedDerivWithin m f s) s) ∧ ∀ m : ℕ, (m : ℕ∞) < n → DifferentiableOn 𝕜 (iteratedDerivWithin m f s) s := by simp only [contDiffOn_iff_continuousOn_differentiableOn hs, iteratedFDerivWithin_eq_equiv_comp, LinearIsometryEquiv.comp_continuousOn_iff, LinearIsometryEquiv.comp_differentiableOn_iff] #align cont_diff_on_iff_continuous_on_differentiable_on_deriv contDiffOn_iff_continuousOn_differentiableOn_deriv	Mathlib/Analysis/Calculus/IteratedDeriv/Defs.lean	184	191	theorem iteratedDerivWithin_succ {x : 𝕜} (hxs : UniqueDiffWithinAt 𝕜 s x) : iteratedDerivWithin (n + 1) f s x = derivWithin (iteratedDerivWithin n f s) s x := by	rw [iteratedDerivWithin_eq_iteratedFDerivWithin, iteratedFDerivWithin_succ_apply_left, iteratedFDerivWithin_eq_equiv_comp, LinearIsometryEquiv.comp_fderivWithin _ hxs, derivWithin] change ((ContinuousMultilinearMap.mkPiRing 𝕜 (Fin n) ((fderivWithin 𝕜 (iteratedDerivWithin n f s) s x : 𝕜 → F) 1) : (Fin n → 𝕜) → F) fun i : Fin n => 1) = (fderivWithin 𝕜 (iteratedDerivWithin n f s) s x : 𝕜 → F) 1 simp
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 theorem lintegral_sub' {f g : α → ℝ≥0∞} (hg : AEMeasurable g μ) (hg_fin : ∫⁻ a, g a ∂μ ≠ ∞) (h_le : g ≤ᵐ[μ] f) : ∫⁻ a, f a - g a ∂μ = ∫⁻ a, f a ∂μ - ∫⁻ a, g a ∂μ := by refine ENNReal.eq_sub_of_add_eq hg_fin ?_ rw [← lintegral_add_right' _ hg] exact lintegral_congr_ae (h_le.mono fun x hx => tsub_add_cancel_of_le hx) #align measure_theory.lintegral_sub' MeasureTheory.lintegral_sub' theorem lintegral_sub {f g : α → ℝ≥0∞} (hg : Measurable g) (hg_fin : ∫⁻ a, g a ∂μ ≠ ∞) (h_le : g ≤ᵐ[μ] f) : ∫⁻ a, f a - g a ∂μ = ∫⁻ a, f a ∂μ - ∫⁻ a, g a ∂μ := lintegral_sub' hg.aemeasurable hg_fin h_le #align measure_theory.lintegral_sub MeasureTheory.lintegral_sub theorem lintegral_sub_le' (f g : α → ℝ≥0∞) (hf : AEMeasurable f μ) : ∫⁻ x, g x ∂μ - ∫⁻ x, f x ∂μ ≤ ∫⁻ x, g x - f x ∂μ := by rw [tsub_le_iff_right] by_cases hfi : ∫⁻ x, f x ∂μ = ∞ · rw [hfi, add_top] exact le_top · rw [← lintegral_add_right' _ hf] gcongr exact le_tsub_add #align measure_theory.lintegral_sub_le' MeasureTheory.lintegral_sub_le' theorem lintegral_sub_le (f g : α → ℝ≥0∞) (hf : Measurable f) : ∫⁻ x, g x ∂μ - ∫⁻ x, f x ∂μ ≤ ∫⁻ x, g x - f x ∂μ := lintegral_sub_le' f g hf.aemeasurable #align measure_theory.lintegral_sub_le MeasureTheory.lintegral_sub_le theorem lintegral_strict_mono_of_ae_le_of_frequently_ae_lt {f g : α → ℝ≥0∞} (hg : AEMeasurable g μ) (hfi : ∫⁻ x, f x ∂μ ≠ ∞) (h_le : f ≤ᵐ[μ] g) (h : ∃ᵐ x ∂μ, f x ≠ g x) : ∫⁻ x, f x ∂μ < ∫⁻ x, g x ∂μ := by contrapose! h simp only [not_frequently, Ne, Classical.not_not] exact ae_eq_of_ae_le_of_lintegral_le h_le hfi hg h #align measure_theory.lintegral_strict_mono_of_ae_le_of_frequently_ae_lt MeasureTheory.lintegral_strict_mono_of_ae_le_of_frequently_ae_lt theorem lintegral_strict_mono_of_ae_le_of_ae_lt_on {f g : α → ℝ≥0∞} (hg : AEMeasurable g μ) (hfi : ∫⁻ x, f x ∂μ ≠ ∞) (h_le : f ≤ᵐ[μ] g) {s : Set α} (hμs : μ s ≠ 0) (h : ∀ᵐ x ∂μ, x ∈ s → f x < g x) : ∫⁻ x, f x ∂μ < ∫⁻ x, g x ∂μ := lintegral_strict_mono_of_ae_le_of_frequently_ae_lt hg hfi h_le <\| ((frequently_ae_mem_iff.2 hμs).and_eventually h).mono fun _x hx => (hx.2 hx.1).ne #align measure_theory.lintegral_strict_mono_of_ae_le_of_ae_lt_on MeasureTheory.lintegral_strict_mono_of_ae_le_of_ae_lt_on theorem lintegral_strict_mono {f g : α → ℝ≥0∞} (hμ : μ ≠ 0) (hg : AEMeasurable g μ) (hfi : ∫⁻ x, f x ∂μ ≠ ∞) (h : ∀ᵐ x ∂μ, f x < g x) : ∫⁻ x, f x ∂μ < ∫⁻ x, g x ∂μ := by rw [Ne, ← Measure.measure_univ_eq_zero] at hμ refine lintegral_strict_mono_of_ae_le_of_ae_lt_on hg hfi (ae_le_of_ae_lt h) hμ ?_ simpa using h #align measure_theory.lintegral_strict_mono MeasureTheory.lintegral_strict_mono theorem set_lintegral_strict_mono {f g : α → ℝ≥0∞} {s : Set α} (hsm : MeasurableSet s) (hs : μ s ≠ 0) (hg : Measurable g) (hfi : ∫⁻ x in s, f x ∂μ ≠ ∞) (h : ∀ᵐ x ∂μ, x ∈ s → f x < g x) : ∫⁻ x in s, f x ∂μ < ∫⁻ x in s, g x ∂μ := lintegral_strict_mono (by simp [hs]) hg.aemeasurable hfi ((ae_restrict_iff' hsm).mpr h) #align measure_theory.set_lintegral_strict_mono MeasureTheory.set_lintegral_strict_mono theorem lintegral_iInf_ae {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, Measurable (f n)) (h_mono : ∀ n : ℕ, f n.succ ≤ᵐ[μ] f n) (h_fin : ∫⁻ a, f 0 a ∂μ ≠ ∞) : ∫⁻ a, ⨅ n, f n a ∂μ = ⨅ n, ∫⁻ a, f n a ∂μ := have fn_le_f0 : ∫⁻ a, ⨅ n, f n a ∂μ ≤ ∫⁻ a, f 0 a ∂μ := lintegral_mono fun a => iInf_le_of_le 0 le_rfl have fn_le_f0' : ⨅ n, ∫⁻ a, f n a ∂μ ≤ ∫⁻ a, f 0 a ∂μ := iInf_le_of_le 0 le_rfl (ENNReal.sub_right_inj h_fin fn_le_f0 fn_le_f0').1 <\| show ∫⁻ a, f 0 a ∂μ - ∫⁻ a, ⨅ n, f n a ∂μ = ∫⁻ a, f 0 a ∂μ - ⨅ n, ∫⁻ a, f n a ∂μ from calc ∫⁻ a, f 0 a ∂μ - ∫⁻ a, ⨅ n, f n a ∂μ = ∫⁻ a, f 0 a - ⨅ n, f n a ∂μ := (lintegral_sub (measurable_iInf h_meas) (ne_top_of_le_ne_top h_fin <\| lintegral_mono fun a => iInf_le _ _) (ae_of_all _ fun a => iInf_le _ _)).symm _ = ∫⁻ a, ⨆ n, f 0 a - f n a ∂μ := congr rfl (funext fun a => ENNReal.sub_iInf) _ = ⨆ n, ∫⁻ a, f 0 a - f n a ∂μ := (lintegral_iSup_ae (fun n => (h_meas 0).sub (h_meas n)) fun n => (h_mono n).mono fun a ha => tsub_le_tsub le_rfl ha) _ = ⨆ n, ∫⁻ a, f 0 a ∂μ - ∫⁻ a, f n a ∂μ := (have h_mono : ∀ᵐ a ∂μ, ∀ n : ℕ, f n.succ a ≤ f n a := ae_all_iff.2 h_mono have h_mono : ∀ n, ∀ᵐ a ∂μ, f n a ≤ f 0 a := fun n => h_mono.mono fun a h => by induction' n with n ih · exact le_rfl · exact le_trans (h n) ih congr_arg iSup <\| funext fun n => lintegral_sub (h_meas _) (ne_top_of_le_ne_top h_fin <\| lintegral_mono_ae <\| h_mono n) (h_mono n)) _ = ∫⁻ a, f 0 a ∂μ - ⨅ n, ∫⁻ a, f n a ∂μ := ENNReal.sub_iInf.symm #align measure_theory.lintegral_infi_ae MeasureTheory.lintegral_iInf_ae theorem lintegral_iInf {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, Measurable (f n)) (h_anti : Antitone f) (h_fin : ∫⁻ a, f 0 a ∂μ ≠ ∞) : ∫⁻ a, ⨅ n, f n a ∂μ = ⨅ n, ∫⁻ a, f n a ∂μ := lintegral_iInf_ae h_meas (fun n => ae_of_all _ <\| h_anti n.le_succ) h_fin #align measure_theory.lintegral_infi MeasureTheory.lintegral_iInf theorem lintegral_iInf' {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, AEMeasurable (f n) μ) (h_anti : ∀ᵐ a ∂μ, Antitone (fun i ↦ f i a)) (h_fin : ∫⁻ a, f 0 a ∂μ ≠ ∞) : ∫⁻ a, ⨅ n, f n a ∂μ = ⨅ n, ∫⁻ a, f n a ∂μ := by simp_rw [← iInf_apply] let p : α → (ℕ → ℝ≥0∞) → Prop := fun _ f' => Antitone f' have hp : ∀ᵐ x ∂μ, p x fun i => f i x := h_anti have h_ae_seq_mono : Antitone (aeSeq h_meas p) := by intro n m hnm x by_cases hx : x ∈ aeSeqSet h_meas p · exact aeSeq.prop_of_mem_aeSeqSet h_meas hx hnm · simp only [aeSeq, hx, if_false] exact le_rfl rw [lintegral_congr_ae (aeSeq.iInf h_meas hp).symm] simp_rw [iInf_apply] rw [lintegral_iInf (aeSeq.measurable h_meas p) h_ae_seq_mono] · congr exact funext fun n ↦ lintegral_congr_ae (aeSeq.aeSeq_n_eq_fun_n_ae h_meas hp n) · rwa [lintegral_congr_ae (aeSeq.aeSeq_n_eq_fun_n_ae h_meas hp 0)] theorem lintegral_iInf_directed_of_measurable {mα : MeasurableSpace α} [Countable β] {f : β → α → ℝ≥0∞} {μ : Measure α} (hμ : μ ≠ 0) (hf : ∀ b, Measurable (f b)) (hf_int : ∀ b, ∫⁻ a, f b a ∂μ ≠ ∞) (h_directed : Directed (· ≥ ·) f) : ∫⁻ a, ⨅ b, f b a ∂μ = ⨅ b, ∫⁻ a, f b a ∂μ := by cases nonempty_encodable β cases isEmpty_or_nonempty β · simp only [iInf_of_empty, lintegral_const, ENNReal.top_mul (Measure.measure_univ_ne_zero.mpr hμ)] inhabit β have : ∀ a, ⨅ b, f b a = ⨅ n, f (h_directed.sequence f n) a := by refine fun a => le_antisymm (le_iInf fun n => iInf_le _ _) (le_iInf fun b => iInf_le_of_le (Encodable.encode b + 1) ?_) exact h_directed.sequence_le b a -- Porting note: used `∘` below to deal with its reduced reducibility calc ∫⁻ a, ⨅ b, f b a ∂μ _ = ∫⁻ a, ⨅ n, (f ∘ h_directed.sequence f) n a ∂μ := by simp only [this, Function.comp_apply] _ = ⨅ n, ∫⁻ a, (f ∘ h_directed.sequence f) n a ∂μ := by rw [lintegral_iInf ?_ h_directed.sequence_anti] · exact hf_int _ · exact fun n => hf _ _ = ⨅ b, ∫⁻ a, f b a ∂μ := by refine le_antisymm (le_iInf fun b => ?_) (le_iInf fun n => ?_) · exact iInf_le_of_le (Encodable.encode b + 1) (lintegral_mono <\| h_directed.sequence_le b) · exact iInf_le (fun b => ∫⁻ a, f b a ∂μ) _ #align lintegral_infi_directed_of_measurable MeasureTheory.lintegral_iInf_directed_of_measurable theorem lintegral_liminf_le' {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, AEMeasurable (f n) μ) : ∫⁻ a, liminf (fun n => f n a) atTop ∂μ ≤ liminf (fun n => ∫⁻ a, f n a ∂μ) atTop := calc ∫⁻ a, liminf (fun n => f n a) atTop ∂μ = ∫⁻ a, ⨆ n : ℕ, ⨅ i ≥ n, f i a ∂μ := by simp only [liminf_eq_iSup_iInf_of_nat] _ = ⨆ n : ℕ, ∫⁻ a, ⨅ i ≥ n, f i a ∂μ := (lintegral_iSup' (fun n => aemeasurable_biInf _ (to_countable _) (fun i _ ↦ h_meas i)) (ae_of_all μ fun a n m hnm => iInf_le_iInf_of_subset fun i hi => le_trans hnm hi)) _ ≤ ⨆ n : ℕ, ⨅ i ≥ n, ∫⁻ a, f i a ∂μ := iSup_mono fun n => le_iInf₂_lintegral _ _ = atTop.liminf fun n => ∫⁻ a, f n a ∂μ := Filter.liminf_eq_iSup_iInf_of_nat.symm #align measure_theory.lintegral_liminf_le' MeasureTheory.lintegral_liminf_le' theorem lintegral_liminf_le {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, Measurable (f n)) : ∫⁻ a, liminf (fun n => f n a) atTop ∂μ ≤ liminf (fun n => ∫⁻ a, f n a ∂μ) atTop := lintegral_liminf_le' fun n => (h_meas n).aemeasurable #align measure_theory.lintegral_liminf_le MeasureTheory.lintegral_liminf_le theorem limsup_lintegral_le {f : ℕ → α → ℝ≥0∞} {g : α → ℝ≥0∞} (hf_meas : ∀ n, Measurable (f n)) (h_bound : ∀ n, f n ≤ᵐ[μ] g) (h_fin : ∫⁻ a, g a ∂μ ≠ ∞) : limsup (fun n => ∫⁻ a, f n a ∂μ) atTop ≤ ∫⁻ a, limsup (fun n => f n a) atTop ∂μ := calc limsup (fun n => ∫⁻ a, f n a ∂μ) atTop = ⨅ n : ℕ, ⨆ i ≥ n, ∫⁻ a, f i a ∂μ := limsup_eq_iInf_iSup_of_nat _ ≤ ⨅ n : ℕ, ∫⁻ a, ⨆ i ≥ n, f i a ∂μ := iInf_mono fun n => iSup₂_lintegral_le _ _ = ∫⁻ a, ⨅ n : ℕ, ⨆ i ≥ n, f i a ∂μ := by refine (lintegral_iInf ?_ ?_ ?_).symm · intro n exact measurable_biSup _ (to_countable _) (fun i _ ↦ hf_meas i) · intro n m hnm a exact iSup_le_iSup_of_subset fun i hi => le_trans hnm hi · refine ne_top_of_le_ne_top h_fin (lintegral_mono_ae ?_) refine (ae_all_iff.2 h_bound).mono fun n hn => ?_ exact iSup_le fun i => iSup_le fun _ => hn i _ = ∫⁻ a, limsup (fun n => f n a) atTop ∂μ := by simp only [limsup_eq_iInf_iSup_of_nat] #align measure_theory.limsup_lintegral_le MeasureTheory.limsup_lintegral_le theorem tendsto_lintegral_of_dominated_convergence {F : ℕ → α → ℝ≥0∞} {f : α → ℝ≥0∞} (bound : α → ℝ≥0∞) (hF_meas : ∀ n, Measurable (F n)) (h_bound : ∀ n, F n ≤ᵐ[μ] bound) (h_fin : ∫⁻ a, bound a ∂μ ≠ ∞) (h_lim : ∀ᵐ a ∂μ, Tendsto (fun n => F n a) atTop (𝓝 (f a))) : Tendsto (fun n => ∫⁻ a, F n a ∂μ) atTop (𝓝 (∫⁻ a, f a ∂μ)) := tendsto_of_le_liminf_of_limsup_le (calc ∫⁻ a, f a ∂μ = ∫⁻ a, liminf (fun n : ℕ => F n a) atTop ∂μ := lintegral_congr_ae <\| h_lim.mono fun a h => h.liminf_eq.symm _ ≤ liminf (fun n => ∫⁻ a, F n a ∂μ) atTop := lintegral_liminf_le hF_meas ) (calc limsup (fun n : ℕ => ∫⁻ a, F n a ∂μ) atTop ≤ ∫⁻ a, limsup (fun n => F n a) atTop ∂μ := limsup_lintegral_le hF_meas h_bound h_fin _ = ∫⁻ a, f a ∂μ := lintegral_congr_ae <\| h_lim.mono fun a h => h.limsup_eq ) #align measure_theory.tendsto_lintegral_of_dominated_convergence MeasureTheory.tendsto_lintegral_of_dominated_convergence theorem tendsto_lintegral_of_dominated_convergence' {F : ℕ → α → ℝ≥0∞} {f : α → ℝ≥0∞} (bound : α → ℝ≥0∞) (hF_meas : ∀ n, AEMeasurable (F n) μ) (h_bound : ∀ n, F n ≤ᵐ[μ] bound) (h_fin : ∫⁻ a, bound a ∂μ ≠ ∞) (h_lim : ∀ᵐ a ∂μ, Tendsto (fun n => F n a) atTop (𝓝 (f a))) : Tendsto (fun n => ∫⁻ a, F n a ∂μ) atTop (𝓝 (∫⁻ a, f a ∂μ)) := by have : ∀ n, ∫⁻ a, F n a ∂μ = ∫⁻ a, (hF_meas n).mk (F n) a ∂μ := fun n => lintegral_congr_ae (hF_meas n).ae_eq_mk simp_rw [this] apply tendsto_lintegral_of_dominated_convergence bound (fun n => (hF_meas n).measurable_mk) _ h_fin · have : ∀ n, ∀ᵐ a ∂μ, (hF_meas n).mk (F n) a = F n a := fun n => (hF_meas n).ae_eq_mk.symm have : ∀ᵐ a ∂μ, ∀ n, (hF_meas n).mk (F n) a = F n a := ae_all_iff.mpr this filter_upwards [this, h_lim] with a H H' simp_rw [H] exact H' · intro n filter_upwards [h_bound n, (hF_meas n).ae_eq_mk] with a H H' rwa [H'] at H #align measure_theory.tendsto_lintegral_of_dominated_convergence' MeasureTheory.tendsto_lintegral_of_dominated_convergence'	Mathlib/MeasureTheory/Integral/Lebesgue.lean	1,187	1,214	theorem tendsto_lintegral_filter_of_dominated_convergence {ι} {l : Filter ι} [l.IsCountablyGenerated] {F : ι → α → ℝ≥0∞} {f : α → ℝ≥0∞} (bound : α → ℝ≥0∞) (hF_meas : ∀ᶠ n in l, Measurable (F n)) (h_bound : ∀ᶠ n in l, ∀ᵐ a ∂μ, F n a ≤ bound a) (h_fin : ∫⁻ a, bound a ∂μ ≠ ∞) (h_lim : ∀ᵐ a ∂μ, Tendsto (fun n => F n a) l (𝓝 (f a))) : Tendsto (fun n => ∫⁻ a, F n a ∂μ) l (𝓝 <\| ∫⁻ a, f a ∂μ) := by	rw [tendsto_iff_seq_tendsto] intro x xl have hxl := by rw [tendsto_atTop'] at xl exact xl have h := inter_mem hF_meas h_bound replace h := hxl _ h rcases h with ⟨k, h⟩ rw [← tendsto_add_atTop_iff_nat k] refine tendsto_lintegral_of_dominated_convergence ?_ ?_ ?_ ?_ ?_ · exact bound · intro refine (h _ ?_).1 exact Nat.le_add_left _ _ · intro refine (h _ ?_).2 exact Nat.le_add_left _ _ · assumption · refine h_lim.mono fun a h_lim => ?_ apply @Tendsto.comp _ _ _ (fun n => x (n + k)) fun n => F n a · assumption rw [tendsto_add_atTop_iff_nat] assumption
import Mathlib.AlgebraicGeometry.Morphisms.ClosedImmersion import Mathlib.AlgebraicGeometry.Morphisms.QuasiSeparated import Mathlib.AlgebraicGeometry.Pullbacks import Mathlib.CategoryTheory.MorphismProperty.Limits noncomputable section open CategoryTheory CategoryTheory.Limits Opposite TopologicalSpace universe u open scoped AlgebraicGeometry namespace AlgebraicGeometry variable {X Y : Scheme.{u}} (f : X ⟶ Y) @[mk_iff] class IsSeparated : Prop where diagonal_isClosedImmersion : IsClosedImmersion (pullback.diagonal f) := by infer_instance namespace IsSeparated attribute [instance] diagonal_isClosedImmersion theorem isSeparated_eq_diagonal_isClosedImmersion : @IsSeparated = MorphismProperty.diagonal @IsClosedImmersion := by ext exact isSeparated_iff _ instance (priority := 900) isSeparated_of_mono [Mono f] : IsSeparated f where	Mathlib/AlgebraicGeometry/Morphisms/Separated.lean	57	60	theorem respectsIso : MorphismProperty.RespectsIso @IsSeparated := by	rw [isSeparated_eq_diagonal_isClosedImmersion] apply MorphismProperty.RespectsIso.diagonal exact IsClosedImmersion.respectsIso
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 theorem lintegral_sub' {f g : α → ℝ≥0∞} (hg : AEMeasurable g μ) (hg_fin : ∫⁻ a, g a ∂μ ≠ ∞) (h_le : g ≤ᵐ[μ] f) : ∫⁻ a, f a - g a ∂μ = ∫⁻ a, f a ∂μ - ∫⁻ a, g a ∂μ := by refine ENNReal.eq_sub_of_add_eq hg_fin ?_ rw [← lintegral_add_right' _ hg] exact lintegral_congr_ae (h_le.mono fun x hx => tsub_add_cancel_of_le hx) #align measure_theory.lintegral_sub' MeasureTheory.lintegral_sub' theorem lintegral_sub {f g : α → ℝ≥0∞} (hg : Measurable g) (hg_fin : ∫⁻ a, g a ∂μ ≠ ∞) (h_le : g ≤ᵐ[μ] f) : ∫⁻ a, f a - g a ∂μ = ∫⁻ a, f a ∂μ - ∫⁻ a, g a ∂μ := lintegral_sub' hg.aemeasurable hg_fin h_le #align measure_theory.lintegral_sub MeasureTheory.lintegral_sub theorem lintegral_sub_le' (f g : α → ℝ≥0∞) (hf : AEMeasurable f μ) : ∫⁻ x, g x ∂μ - ∫⁻ x, f x ∂μ ≤ ∫⁻ x, g x - f x ∂μ := by rw [tsub_le_iff_right] by_cases hfi : ∫⁻ x, f x ∂μ = ∞ · rw [hfi, add_top] exact le_top · rw [← lintegral_add_right' _ hf] gcongr exact le_tsub_add #align measure_theory.lintegral_sub_le' MeasureTheory.lintegral_sub_le' theorem lintegral_sub_le (f g : α → ℝ≥0∞) (hf : Measurable f) : ∫⁻ x, g x ∂μ - ∫⁻ x, f x ∂μ ≤ ∫⁻ x, g x - f x ∂μ := lintegral_sub_le' f g hf.aemeasurable #align measure_theory.lintegral_sub_le MeasureTheory.lintegral_sub_le theorem lintegral_strict_mono_of_ae_le_of_frequently_ae_lt {f g : α → ℝ≥0∞} (hg : AEMeasurable g μ) (hfi : ∫⁻ x, f x ∂μ ≠ ∞) (h_le : f ≤ᵐ[μ] g) (h : ∃ᵐ x ∂μ, f x ≠ g x) : ∫⁻ x, f x ∂μ < ∫⁻ x, g x ∂μ := by contrapose! h simp only [not_frequently, Ne, Classical.not_not] exact ae_eq_of_ae_le_of_lintegral_le h_le hfi hg h #align measure_theory.lintegral_strict_mono_of_ae_le_of_frequently_ae_lt MeasureTheory.lintegral_strict_mono_of_ae_le_of_frequently_ae_lt theorem lintegral_strict_mono_of_ae_le_of_ae_lt_on {f g : α → ℝ≥0∞} (hg : AEMeasurable g μ) (hfi : ∫⁻ x, f x ∂μ ≠ ∞) (h_le : f ≤ᵐ[μ] g) {s : Set α} (hμs : μ s ≠ 0) (h : ∀ᵐ x ∂μ, x ∈ s → f x < g x) : ∫⁻ x, f x ∂μ < ∫⁻ x, g x ∂μ := lintegral_strict_mono_of_ae_le_of_frequently_ae_lt hg hfi h_le <\| ((frequently_ae_mem_iff.2 hμs).and_eventually h).mono fun _x hx => (hx.2 hx.1).ne #align measure_theory.lintegral_strict_mono_of_ae_le_of_ae_lt_on MeasureTheory.lintegral_strict_mono_of_ae_le_of_ae_lt_on theorem lintegral_strict_mono {f g : α → ℝ≥0∞} (hμ : μ ≠ 0) (hg : AEMeasurable g μ) (hfi : ∫⁻ x, f x ∂μ ≠ ∞) (h : ∀ᵐ x ∂μ, f x < g x) : ∫⁻ x, f x ∂μ < ∫⁻ x, g x ∂μ := by rw [Ne, ← Measure.measure_univ_eq_zero] at hμ refine lintegral_strict_mono_of_ae_le_of_ae_lt_on hg hfi (ae_le_of_ae_lt h) hμ ?_ simpa using h #align measure_theory.lintegral_strict_mono MeasureTheory.lintegral_strict_mono theorem set_lintegral_strict_mono {f g : α → ℝ≥0∞} {s : Set α} (hsm : MeasurableSet s) (hs : μ s ≠ 0) (hg : Measurable g) (hfi : ∫⁻ x in s, f x ∂μ ≠ ∞) (h : ∀ᵐ x ∂μ, x ∈ s → f x < g x) : ∫⁻ x in s, f x ∂μ < ∫⁻ x in s, g x ∂μ := lintegral_strict_mono (by simp [hs]) hg.aemeasurable hfi ((ae_restrict_iff' hsm).mpr h) #align measure_theory.set_lintegral_strict_mono MeasureTheory.set_lintegral_strict_mono theorem lintegral_iInf_ae {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, Measurable (f n)) (h_mono : ∀ n : ℕ, f n.succ ≤ᵐ[μ] f n) (h_fin : ∫⁻ a, f 0 a ∂μ ≠ ∞) : ∫⁻ a, ⨅ n, f n a ∂μ = ⨅ n, ∫⁻ a, f n a ∂μ := have fn_le_f0 : ∫⁻ a, ⨅ n, f n a ∂μ ≤ ∫⁻ a, f 0 a ∂μ := lintegral_mono fun a => iInf_le_of_le 0 le_rfl have fn_le_f0' : ⨅ n, ∫⁻ a, f n a ∂μ ≤ ∫⁻ a, f 0 a ∂μ := iInf_le_of_le 0 le_rfl (ENNReal.sub_right_inj h_fin fn_le_f0 fn_le_f0').1 <\| show ∫⁻ a, f 0 a ∂μ - ∫⁻ a, ⨅ n, f n a ∂μ = ∫⁻ a, f 0 a ∂μ - ⨅ n, ∫⁻ a, f n a ∂μ from calc ∫⁻ a, f 0 a ∂μ - ∫⁻ a, ⨅ n, f n a ∂μ = ∫⁻ a, f 0 a - ⨅ n, f n a ∂μ := (lintegral_sub (measurable_iInf h_meas) (ne_top_of_le_ne_top h_fin <\| lintegral_mono fun a => iInf_le _ _) (ae_of_all _ fun a => iInf_le _ _)).symm _ = ∫⁻ a, ⨆ n, f 0 a - f n a ∂μ := congr rfl (funext fun a => ENNReal.sub_iInf) _ = ⨆ n, ∫⁻ a, f 0 a - f n a ∂μ := (lintegral_iSup_ae (fun n => (h_meas 0).sub (h_meas n)) fun n => (h_mono n).mono fun a ha => tsub_le_tsub le_rfl ha) _ = ⨆ n, ∫⁻ a, f 0 a ∂μ - ∫⁻ a, f n a ∂μ := (have h_mono : ∀ᵐ a ∂μ, ∀ n : ℕ, f n.succ a ≤ f n a := ae_all_iff.2 h_mono have h_mono : ∀ n, ∀ᵐ a ∂μ, f n a ≤ f 0 a := fun n => h_mono.mono fun a h => by induction' n with n ih · exact le_rfl · exact le_trans (h n) ih congr_arg iSup <\| funext fun n => lintegral_sub (h_meas _) (ne_top_of_le_ne_top h_fin <\| lintegral_mono_ae <\| h_mono n) (h_mono n)) _ = ∫⁻ a, f 0 a ∂μ - ⨅ n, ∫⁻ a, f n a ∂μ := ENNReal.sub_iInf.symm #align measure_theory.lintegral_infi_ae MeasureTheory.lintegral_iInf_ae theorem lintegral_iInf {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, Measurable (f n)) (h_anti : Antitone f) (h_fin : ∫⁻ a, f 0 a ∂μ ≠ ∞) : ∫⁻ a, ⨅ n, f n a ∂μ = ⨅ n, ∫⁻ a, f n a ∂μ := lintegral_iInf_ae h_meas (fun n => ae_of_all _ <\| h_anti n.le_succ) h_fin #align measure_theory.lintegral_infi MeasureTheory.lintegral_iInf theorem lintegral_iInf' {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, AEMeasurable (f n) μ) (h_anti : ∀ᵐ a ∂μ, Antitone (fun i ↦ f i a)) (h_fin : ∫⁻ a, f 0 a ∂μ ≠ ∞) : ∫⁻ a, ⨅ n, f n a ∂μ = ⨅ n, ∫⁻ a, f n a ∂μ := by simp_rw [← iInf_apply] let p : α → (ℕ → ℝ≥0∞) → Prop := fun _ f' => Antitone f' have hp : ∀ᵐ x ∂μ, p x fun i => f i x := h_anti have h_ae_seq_mono : Antitone (aeSeq h_meas p) := by intro n m hnm x by_cases hx : x ∈ aeSeqSet h_meas p · exact aeSeq.prop_of_mem_aeSeqSet h_meas hx hnm · simp only [aeSeq, hx, if_false] exact le_rfl rw [lintegral_congr_ae (aeSeq.iInf h_meas hp).symm] simp_rw [iInf_apply] rw [lintegral_iInf (aeSeq.measurable h_meas p) h_ae_seq_mono] · congr exact funext fun n ↦ lintegral_congr_ae (aeSeq.aeSeq_n_eq_fun_n_ae h_meas hp n) · rwa [lintegral_congr_ae (aeSeq.aeSeq_n_eq_fun_n_ae h_meas hp 0)] theorem lintegral_iInf_directed_of_measurable {mα : MeasurableSpace α} [Countable β] {f : β → α → ℝ≥0∞} {μ : Measure α} (hμ : μ ≠ 0) (hf : ∀ b, Measurable (f b)) (hf_int : ∀ b, ∫⁻ a, f b a ∂μ ≠ ∞) (h_directed : Directed (· ≥ ·) f) : ∫⁻ a, ⨅ b, f b a ∂μ = ⨅ b, ∫⁻ a, f b a ∂μ := by cases nonempty_encodable β cases isEmpty_or_nonempty β · simp only [iInf_of_empty, lintegral_const, ENNReal.top_mul (Measure.measure_univ_ne_zero.mpr hμ)] inhabit β have : ∀ a, ⨅ b, f b a = ⨅ n, f (h_directed.sequence f n) a := by refine fun a => le_antisymm (le_iInf fun n => iInf_le _ _) (le_iInf fun b => iInf_le_of_le (Encodable.encode b + 1) ?_) exact h_directed.sequence_le b a -- Porting note: used `∘` below to deal with its reduced reducibility calc ∫⁻ a, ⨅ b, f b a ∂μ _ = ∫⁻ a, ⨅ n, (f ∘ h_directed.sequence f) n a ∂μ := by simp only [this, Function.comp_apply] _ = ⨅ n, ∫⁻ a, (f ∘ h_directed.sequence f) n a ∂μ := by rw [lintegral_iInf ?_ h_directed.sequence_anti] · exact hf_int _ · exact fun n => hf _ _ = ⨅ b, ∫⁻ a, f b a ∂μ := by refine le_antisymm (le_iInf fun b => ?_) (le_iInf fun n => ?_) · exact iInf_le_of_le (Encodable.encode b + 1) (lintegral_mono <\| h_directed.sequence_le b) · exact iInf_le (fun b => ∫⁻ a, f b a ∂μ) _ #align lintegral_infi_directed_of_measurable MeasureTheory.lintegral_iInf_directed_of_measurable theorem lintegral_liminf_le' {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, AEMeasurable (f n) μ) : ∫⁻ a, liminf (fun n => f n a) atTop ∂μ ≤ liminf (fun n => ∫⁻ a, f n a ∂μ) atTop := calc ∫⁻ a, liminf (fun n => f n a) atTop ∂μ = ∫⁻ a, ⨆ n : ℕ, ⨅ i ≥ n, f i a ∂μ := by simp only [liminf_eq_iSup_iInf_of_nat] _ = ⨆ n : ℕ, ∫⁻ a, ⨅ i ≥ n, f i a ∂μ := (lintegral_iSup' (fun n => aemeasurable_biInf _ (to_countable _) (fun i _ ↦ h_meas i)) (ae_of_all μ fun a n m hnm => iInf_le_iInf_of_subset fun i hi => le_trans hnm hi)) _ ≤ ⨆ n : ℕ, ⨅ i ≥ n, ∫⁻ a, f i a ∂μ := iSup_mono fun n => le_iInf₂_lintegral _ _ = atTop.liminf fun n => ∫⁻ a, f n a ∂μ := Filter.liminf_eq_iSup_iInf_of_nat.symm #align measure_theory.lintegral_liminf_le' MeasureTheory.lintegral_liminf_le' theorem lintegral_liminf_le {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, Measurable (f n)) : ∫⁻ a, liminf (fun n => f n a) atTop ∂μ ≤ liminf (fun n => ∫⁻ a, f n a ∂μ) atTop := lintegral_liminf_le' fun n => (h_meas n).aemeasurable #align measure_theory.lintegral_liminf_le MeasureTheory.lintegral_liminf_le theorem limsup_lintegral_le {f : ℕ → α → ℝ≥0∞} {g : α → ℝ≥0∞} (hf_meas : ∀ n, Measurable (f n)) (h_bound : ∀ n, f n ≤ᵐ[μ] g) (h_fin : ∫⁻ a, g a ∂μ ≠ ∞) : limsup (fun n => ∫⁻ a, f n a ∂μ) atTop ≤ ∫⁻ a, limsup (fun n => f n a) atTop ∂μ := calc limsup (fun n => ∫⁻ a, f n a ∂μ) atTop = ⨅ n : ℕ, ⨆ i ≥ n, ∫⁻ a, f i a ∂μ := limsup_eq_iInf_iSup_of_nat _ ≤ ⨅ n : ℕ, ∫⁻ a, ⨆ i ≥ n, f i a ∂μ := iInf_mono fun n => iSup₂_lintegral_le _ _ = ∫⁻ a, ⨅ n : ℕ, ⨆ i ≥ n, f i a ∂μ := by refine (lintegral_iInf ?_ ?_ ?_).symm · intro n exact measurable_biSup _ (to_countable _) (fun i _ ↦ hf_meas i) · intro n m hnm a exact iSup_le_iSup_of_subset fun i hi => le_trans hnm hi · refine ne_top_of_le_ne_top h_fin (lintegral_mono_ae ?_) refine (ae_all_iff.2 h_bound).mono fun n hn => ?_ exact iSup_le fun i => iSup_le fun _ => hn i _ = ∫⁻ a, limsup (fun n => f n a) atTop ∂μ := by simp only [limsup_eq_iInf_iSup_of_nat] #align measure_theory.limsup_lintegral_le MeasureTheory.limsup_lintegral_le theorem tendsto_lintegral_of_dominated_convergence {F : ℕ → α → ℝ≥0∞} {f : α → ℝ≥0∞} (bound : α → ℝ≥0∞) (hF_meas : ∀ n, Measurable (F n)) (h_bound : ∀ n, F n ≤ᵐ[μ] bound) (h_fin : ∫⁻ a, bound a ∂μ ≠ ∞) (h_lim : ∀ᵐ a ∂μ, Tendsto (fun n => F n a) atTop (𝓝 (f a))) : Tendsto (fun n => ∫⁻ a, F n a ∂μ) atTop (𝓝 (∫⁻ a, f a ∂μ)) := tendsto_of_le_liminf_of_limsup_le (calc ∫⁻ a, f a ∂μ = ∫⁻ a, liminf (fun n : ℕ => F n a) atTop ∂μ := lintegral_congr_ae <\| h_lim.mono fun a h => h.liminf_eq.symm _ ≤ liminf (fun n => ∫⁻ a, F n a ∂μ) atTop := lintegral_liminf_le hF_meas ) (calc limsup (fun n : ℕ => ∫⁻ a, F n a ∂μ) atTop ≤ ∫⁻ a, limsup (fun n => F n a) atTop ∂μ := limsup_lintegral_le hF_meas h_bound h_fin _ = ∫⁻ a, f a ∂μ := lintegral_congr_ae <\| h_lim.mono fun a h => h.limsup_eq ) #align measure_theory.tendsto_lintegral_of_dominated_convergence MeasureTheory.tendsto_lintegral_of_dominated_convergence theorem tendsto_lintegral_of_dominated_convergence' {F : ℕ → α → ℝ≥0∞} {f : α → ℝ≥0∞} (bound : α → ℝ≥0∞) (hF_meas : ∀ n, AEMeasurable (F n) μ) (h_bound : ∀ n, F n ≤ᵐ[μ] bound) (h_fin : ∫⁻ a, bound a ∂μ ≠ ∞) (h_lim : ∀ᵐ a ∂μ, Tendsto (fun n => F n a) atTop (𝓝 (f a))) : Tendsto (fun n => ∫⁻ a, F n a ∂μ) atTop (𝓝 (∫⁻ a, f a ∂μ)) := by have : ∀ n, ∫⁻ a, F n a ∂μ = ∫⁻ a, (hF_meas n).mk (F n) a ∂μ := fun n => lintegral_congr_ae (hF_meas n).ae_eq_mk simp_rw [this] apply tendsto_lintegral_of_dominated_convergence bound (fun n => (hF_meas n).measurable_mk) _ h_fin · have : ∀ n, ∀ᵐ a ∂μ, (hF_meas n).mk (F n) a = F n a := fun n => (hF_meas n).ae_eq_mk.symm have : ∀ᵐ a ∂μ, ∀ n, (hF_meas n).mk (F n) a = F n a := ae_all_iff.mpr this filter_upwards [this, h_lim] with a H H' simp_rw [H] exact H' · intro n filter_upwards [h_bound n, (hF_meas n).ae_eq_mk] with a H H' rwa [H'] at H #align measure_theory.tendsto_lintegral_of_dominated_convergence' MeasureTheory.tendsto_lintegral_of_dominated_convergence' theorem tendsto_lintegral_filter_of_dominated_convergence {ι} {l : Filter ι} [l.IsCountablyGenerated] {F : ι → α → ℝ≥0∞} {f : α → ℝ≥0∞} (bound : α → ℝ≥0∞) (hF_meas : ∀ᶠ n in l, Measurable (F n)) (h_bound : ∀ᶠ n in l, ∀ᵐ a ∂μ, F n a ≤ bound a) (h_fin : ∫⁻ a, bound a ∂μ ≠ ∞) (h_lim : ∀ᵐ a ∂μ, Tendsto (fun n => F n a) l (𝓝 (f a))) : Tendsto (fun n => ∫⁻ a, F n a ∂μ) l (𝓝 <\| ∫⁻ a, f a ∂μ) := by rw [tendsto_iff_seq_tendsto] intro x xl have hxl := by rw [tendsto_atTop'] at xl exact xl have h := inter_mem hF_meas h_bound replace h := hxl _ h rcases h with ⟨k, h⟩ rw [← tendsto_add_atTop_iff_nat k] refine tendsto_lintegral_of_dominated_convergence ?_ ?_ ?_ ?_ ?_ · exact bound · intro refine (h _ ?_).1 exact Nat.le_add_left _ _ · intro refine (h _ ?_).2 exact Nat.le_add_left _ _ · assumption · refine h_lim.mono fun a h_lim => ?_ apply @Tendsto.comp _ _ _ (fun n => x (n + k)) fun n => F n a · assumption rw [tendsto_add_atTop_iff_nat] assumption #align measure_theory.tendsto_lintegral_filter_of_dominated_convergence MeasureTheory.tendsto_lintegral_filter_of_dominated_convergence theorem lintegral_tendsto_of_tendsto_of_antitone {f : ℕ → α → ℝ≥0∞} {F : α → ℝ≥0∞} (hf : ∀ n, AEMeasurable (f n) μ) (h_anti : ∀ᵐ x ∂μ, Antitone fun n ↦ f n x) (h0 : ∫⁻ a, f 0 a ∂μ ≠ ∞) (h_tendsto : ∀ᵐ x ∂μ, Tendsto (fun n ↦ f n x) atTop (𝓝 (F x))) : Tendsto (fun n ↦ ∫⁻ x, f n x ∂μ) atTop (𝓝 (∫⁻ x, F x ∂μ)) := by have : Antitone fun n ↦ ∫⁻ x, f n x ∂μ := fun i j hij ↦ lintegral_mono_ae (h_anti.mono fun x hx ↦ hx hij) suffices key : ∫⁻ x, F x ∂μ = ⨅ n, ∫⁻ x, f n x ∂μ by rw [key] exact tendsto_atTop_iInf this rw [← lintegral_iInf' hf h_anti h0] refine lintegral_congr_ae ?_ filter_upwards [h_anti, h_tendsto] with _ hx_anti hx_tendsto using tendsto_nhds_unique hx_tendsto (tendsto_atTop_iInf hx_anti) section open Encodable theorem lintegral_iSup_directed_of_measurable [Countable β] {f : β → α → ℝ≥0∞} (hf : ∀ b, Measurable (f b)) (h_directed : Directed (· ≤ ·) f) : ∫⁻ a, ⨆ b, f b a ∂μ = ⨆ b, ∫⁻ a, f b a ∂μ := by cases nonempty_encodable β cases isEmpty_or_nonempty β · simp [iSup_of_empty] inhabit β have : ∀ a, ⨆ b, f b a = ⨆ n, f (h_directed.sequence f n) a := by intro a refine le_antisymm (iSup_le fun b => ?_) (iSup_le fun n => le_iSup (fun n => f n a) _) exact le_iSup_of_le (encode b + 1) (h_directed.le_sequence b a) calc ∫⁻ a, ⨆ b, f b a ∂μ = ∫⁻ a, ⨆ n, f (h_directed.sequence f n) a ∂μ := by simp only [this] _ = ⨆ n, ∫⁻ a, f (h_directed.sequence f n) a ∂μ := (lintegral_iSup (fun n => hf _) h_directed.sequence_mono) _ = ⨆ b, ∫⁻ a, f b a ∂μ := by refine le_antisymm (iSup_le fun n => ?_) (iSup_le fun b => ?_) · exact le_iSup (fun b => ∫⁻ a, f b a ∂μ) _ · exact le_iSup_of_le (encode b + 1) (lintegral_mono <\| h_directed.le_sequence b) #align measure_theory.lintegral_supr_directed_of_measurable MeasureTheory.lintegral_iSup_directed_of_measurable theorem lintegral_iSup_directed [Countable β] {f : β → α → ℝ≥0∞} (hf : ∀ b, AEMeasurable (f b) μ) (h_directed : Directed (· ≤ ·) f) : ∫⁻ a, ⨆ b, f b a ∂μ = ⨆ b, ∫⁻ a, f b a ∂μ := by simp_rw [← iSup_apply] let p : α → (β → ENNReal) → Prop := fun x f' => Directed LE.le f' have hp : ∀ᵐ x ∂μ, p x fun i => f i x := by filter_upwards [] with x i j obtain ⟨z, hz₁, hz₂⟩ := h_directed i j exact ⟨z, hz₁ x, hz₂ x⟩ have h_ae_seq_directed : Directed LE.le (aeSeq hf p) := by intro b₁ b₂ obtain ⟨z, hz₁, hz₂⟩ := h_directed b₁ b₂ refine ⟨z, ?_, ?_⟩ <;> · intro x by_cases hx : x ∈ aeSeqSet hf p · repeat rw [aeSeq.aeSeq_eq_fun_of_mem_aeSeqSet hf hx] apply_rules [hz₁, hz₂] · simp only [aeSeq, hx, if_false] exact le_rfl convert lintegral_iSup_directed_of_measurable (aeSeq.measurable hf p) h_ae_seq_directed using 1 · simp_rw [← iSup_apply] rw [lintegral_congr_ae (aeSeq.iSup hf hp).symm] · congr 1 ext1 b rw [lintegral_congr_ae] apply EventuallyEq.symm exact aeSeq.aeSeq_n_eq_fun_n_ae hf hp _ #align measure_theory.lintegral_supr_directed MeasureTheory.lintegral_iSup_directed end theorem lintegral_tsum [Countable β] {f : β → α → ℝ≥0∞} (hf : ∀ i, AEMeasurable (f i) μ) : ∫⁻ a, ∑' i, f i a ∂μ = ∑' i, ∫⁻ a, f i a ∂μ := by simp only [ENNReal.tsum_eq_iSup_sum] rw [lintegral_iSup_directed] · simp [lintegral_finset_sum' _ fun i _ => hf i] · intro b exact Finset.aemeasurable_sum _ fun i _ => hf i · intro s t use s ∪ t constructor · exact fun a => Finset.sum_le_sum_of_subset Finset.subset_union_left · exact fun a => Finset.sum_le_sum_of_subset Finset.subset_union_right #align measure_theory.lintegral_tsum MeasureTheory.lintegral_tsum open Measure theorem lintegral_iUnion₀ [Countable β] {s : β → Set α} (hm : ∀ i, NullMeasurableSet (s i) μ) (hd : Pairwise (AEDisjoint μ on s)) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i, s i, f a ∂μ = ∑' i, ∫⁻ a in s i, f a ∂μ := by simp only [Measure.restrict_iUnion_ae hd hm, lintegral_sum_measure] #align measure_theory.lintegral_Union₀ MeasureTheory.lintegral_iUnion₀ theorem lintegral_iUnion [Countable β] {s : β → Set α} (hm : ∀ i, MeasurableSet (s i)) (hd : Pairwise (Disjoint on s)) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i, s i, f a ∂μ = ∑' i, ∫⁻ a in s i, f a ∂μ := lintegral_iUnion₀ (fun i => (hm i).nullMeasurableSet) hd.aedisjoint f #align measure_theory.lintegral_Union MeasureTheory.lintegral_iUnion theorem lintegral_biUnion₀ {t : Set β} {s : β → Set α} (ht : t.Countable) (hm : ∀ i ∈ t, NullMeasurableSet (s i) μ) (hd : t.Pairwise (AEDisjoint μ on s)) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i ∈ t, s i, f a ∂μ = ∑' i : t, ∫⁻ a in s i, f a ∂μ := by haveI := ht.toEncodable rw [biUnion_eq_iUnion, lintegral_iUnion₀ (SetCoe.forall'.1 hm) (hd.subtype _ _)] #align measure_theory.lintegral_bUnion₀ MeasureTheory.lintegral_biUnion₀ theorem lintegral_biUnion {t : Set β} {s : β → Set α} (ht : t.Countable) (hm : ∀ i ∈ t, MeasurableSet (s i)) (hd : t.PairwiseDisjoint s) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i ∈ t, s i, f a ∂μ = ∑' i : t, ∫⁻ a in s i, f a ∂μ := lintegral_biUnion₀ ht (fun i hi => (hm i hi).nullMeasurableSet) hd.aedisjoint f #align measure_theory.lintegral_bUnion MeasureTheory.lintegral_biUnion theorem lintegral_biUnion_finset₀ {s : Finset β} {t : β → Set α} (hd : Set.Pairwise (↑s) (AEDisjoint μ on t)) (hm : ∀ b ∈ s, NullMeasurableSet (t b) μ) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ b ∈ s, t b, f a ∂μ = ∑ b ∈ s, ∫⁻ a in t b, f a ∂μ := by simp only [← Finset.mem_coe, lintegral_biUnion₀ s.countable_toSet hm hd, ← Finset.tsum_subtype'] #align measure_theory.lintegral_bUnion_finset₀ MeasureTheory.lintegral_biUnion_finset₀ theorem lintegral_biUnion_finset {s : Finset β} {t : β → Set α} (hd : Set.PairwiseDisjoint (↑s) t) (hm : ∀ b ∈ s, MeasurableSet (t b)) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ b ∈ s, t b, f a ∂μ = ∑ b ∈ s, ∫⁻ a in t b, f a ∂μ := lintegral_biUnion_finset₀ hd.aedisjoint (fun b hb => (hm b hb).nullMeasurableSet) f #align measure_theory.lintegral_bUnion_finset MeasureTheory.lintegral_biUnion_finset theorem lintegral_iUnion_le [Countable β] (s : β → Set α) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i, s i, f a ∂μ ≤ ∑' i, ∫⁻ a in s i, f a ∂μ := by rw [← lintegral_sum_measure] exact lintegral_mono' restrict_iUnion_le le_rfl #align measure_theory.lintegral_Union_le MeasureTheory.lintegral_iUnion_le theorem lintegral_union {f : α → ℝ≥0∞} {A B : Set α} (hB : MeasurableSet B) (hAB : Disjoint A B) : ∫⁻ a in A ∪ B, f a ∂μ = ∫⁻ a in A, f a ∂μ + ∫⁻ a in B, f a ∂μ := by rw [restrict_union hAB hB, lintegral_add_measure] #align measure_theory.lintegral_union MeasureTheory.lintegral_union theorem lintegral_union_le (f : α → ℝ≥0∞) (s t : Set α) : ∫⁻ a in s ∪ t, f a ∂μ ≤ ∫⁻ a in s, f a ∂μ + ∫⁻ a in t, f a ∂μ := by rw [← lintegral_add_measure] exact lintegral_mono' (restrict_union_le _ _) le_rfl theorem lintegral_inter_add_diff {B : Set α} (f : α → ℝ≥0∞) (A : Set α) (hB : MeasurableSet B) : ∫⁻ x in A ∩ B, f x ∂μ + ∫⁻ x in A \ B, f x ∂μ = ∫⁻ x in A, f x ∂μ := by rw [← lintegral_add_measure, restrict_inter_add_diff _ hB] #align measure_theory.lintegral_inter_add_diff MeasureTheory.lintegral_inter_add_diff theorem lintegral_add_compl (f : α → ℝ≥0∞) {A : Set α} (hA : MeasurableSet A) : ∫⁻ x in A, f x ∂μ + ∫⁻ x in Aᶜ, f x ∂μ = ∫⁻ x, f x ∂μ := by rw [← lintegral_add_measure, Measure.restrict_add_restrict_compl hA] #align measure_theory.lintegral_add_compl MeasureTheory.lintegral_add_compl theorem lintegral_max {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) : ∫⁻ x, max (f x) (g x) ∂μ = ∫⁻ x in { x \| f x ≤ g x }, g x ∂μ + ∫⁻ x in { x \| g x < f x }, f x ∂μ := by have hm : MeasurableSet { x \| f x ≤ g x } := measurableSet_le hf hg rw [← lintegral_add_compl (fun x => max (f x) (g x)) hm] simp only [← compl_setOf, ← not_le] refine congr_arg₂ (· + ·) (set_lintegral_congr_fun hm ?_) (set_lintegral_congr_fun hm.compl ?_) exacts [ae_of_all _ fun x => max_eq_right (a := f x) (b := g x), ae_of_all _ fun x (hx : ¬ f x ≤ g x) => max_eq_left (not_le.1 hx).le] #align measure_theory.lintegral_max MeasureTheory.lintegral_max theorem set_lintegral_max {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) (s : Set α) : ∫⁻ x in s, max (f x) (g x) ∂μ = ∫⁻ x in s ∩ { x \| f x ≤ g x }, g x ∂μ + ∫⁻ x in s ∩ { x \| g x < f x }, f x ∂μ := by rw [lintegral_max hf hg, restrict_restrict, restrict_restrict, inter_comm s, inter_comm s] exacts [measurableSet_lt hg hf, measurableSet_le hf hg] #align measure_theory.set_lintegral_max MeasureTheory.set_lintegral_max theorem lintegral_map {mβ : MeasurableSpace β} {f : β → ℝ≥0∞} {g : α → β} (hf : Measurable f) (hg : Measurable g) : ∫⁻ a, f a ∂map g μ = ∫⁻ a, f (g a) ∂μ := by erw [lintegral_eq_iSup_eapprox_lintegral hf, lintegral_eq_iSup_eapprox_lintegral (hf.comp hg)] congr with n : 1 convert SimpleFunc.lintegral_map _ hg ext1 x; simp only [eapprox_comp hf hg, coe_comp] #align measure_theory.lintegral_map MeasureTheory.lintegral_map	Mathlib/MeasureTheory/Integral/Lebesgue.lean	1,394	1,405	theorem lintegral_map' {mβ : MeasurableSpace β} {f : β → ℝ≥0∞} {g : α → β} (hf : AEMeasurable f (Measure.map g μ)) (hg : AEMeasurable g μ) : ∫⁻ a, f a ∂Measure.map g μ = ∫⁻ a, f (g a) ∂μ := calc ∫⁻ a, f a ∂Measure.map g μ = ∫⁻ a, hf.mk f a ∂Measure.map g μ := lintegral_congr_ae hf.ae_eq_mk _ = ∫⁻ a, hf.mk f a ∂Measure.map (hg.mk g) μ := by	congr 1 exact Measure.map_congr hg.ae_eq_mk _ = ∫⁻ a, hf.mk f (hg.mk g a) ∂μ := lintegral_map hf.measurable_mk hg.measurable_mk _ = ∫⁻ a, hf.mk f (g a) ∂μ := lintegral_congr_ae <\| hg.ae_eq_mk.symm.fun_comp _ _ = ∫⁻ a, f (g a) ∂μ := lintegral_congr_ae (ae_eq_comp hg hf.ae_eq_mk.symm)
import Mathlib.Algebra.GroupWithZero.Units.Lemmas import Mathlib.Algebra.Order.BigOperators.Group.Finset import Mathlib.Data.Fintype.BigOperators #align_import data.sign from "leanprover-community/mathlib"@"2445c98ae4b87eabebdde552593519b9b6dc350c" -- Porting note (#11081): cannot automatically derive Fintype, added manually inductive SignType \| zero \| neg \| pos deriving DecidableEq, Inhabited #align sign_type SignType -- Porting note: these lemmas are autogenerated by the inductive definition and are not -- in simple form due to the below `x_eq_x` lemmas attribute [nolint simpNF] SignType.zero.sizeOf_spec attribute [nolint simpNF] SignType.neg.sizeOf_spec attribute [nolint simpNF] SignType.pos.sizeOf_spec namespace SignType -- Porting note: Added Fintype SignType manually instance : Fintype SignType := Fintype.ofMultiset (zero :: neg :: pos :: List.nil) (fun x ↦ by cases x <;> simp) instance : Zero SignType := ⟨zero⟩ instance : One SignType := ⟨pos⟩ instance : Neg SignType := ⟨fun s => match s with \| neg => pos \| zero => zero \| pos => neg⟩ @[simp] theorem zero_eq_zero : zero = 0 := rfl #align sign_type.zero_eq_zero SignType.zero_eq_zero @[simp] theorem neg_eq_neg_one : neg = -1 := rfl #align sign_type.neg_eq_neg_one SignType.neg_eq_neg_one @[simp] theorem pos_eq_one : pos = 1 := rfl #align sign_type.pos_eq_one SignType.pos_eq_one instance : Mul SignType := ⟨fun x y => match x with \| neg => -y \| zero => zero \| pos => y⟩ protected inductive LE : SignType → SignType → Prop \| of_neg (a) : SignType.LE neg a \| zero : SignType.LE zero zero \| of_pos (a) : SignType.LE a pos #align sign_type.le SignType.LE instance : LE SignType := ⟨SignType.LE⟩ instance LE.decidableRel : DecidableRel SignType.LE := fun a b => by cases a <;> cases b <;> first \| exact isTrue (by constructor)\| exact isFalse (by rintro ⟨_⟩) instance decidableEq : DecidableEq SignType := fun a b => by cases a <;> cases b <;> first \| exact isTrue (by constructor)\| exact isFalse (by rintro ⟨_⟩) private lemma mul_comm : ∀ (a b : SignType), a * b = b * a := by rintro ⟨⟩ ⟨⟩ <;> rfl private lemma mul_assoc : ∀ (a b c : SignType), (a * b) * c = a * (b * c) := by rintro ⟨⟩ ⟨⟩ ⟨⟩ <;> rfl instance : CommGroupWithZero SignType where zero := 0 one := 1 mul := (· * ·) inv := id mul_zero a := by cases a <;> rfl zero_mul a := by cases a <;> rfl mul_one a := by cases a <;> rfl one_mul a := by cases a <;> rfl mul_inv_cancel a ha := by cases a <;> trivial mul_comm := mul_comm mul_assoc := mul_assoc exists_pair_ne := ⟨0, 1, by rintro ⟨_⟩⟩ inv_zero := rfl private lemma le_antisymm (a b : SignType) (_ : a ≤ b) (_: b ≤ a) : a = b := by cases a <;> cases b <;> trivial private lemma le_trans (a b c : SignType) (_ : a ≤ b) (_: b ≤ c) : a ≤ c := by cases a <;> cases b <;> cases c <;> tauto instance : LinearOrder SignType where le := (· ≤ ·) le_refl a := by cases a <;> constructor le_total a b := by cases a <;> cases b <;> first \| left; constructor \| right; constructor le_antisymm := le_antisymm le_trans := le_trans decidableLE := LE.decidableRel decidableEq := SignType.decidableEq instance : BoundedOrder SignType where top := 1 le_top := LE.of_pos bot := -1 bot_le := LE.of_neg instance : HasDistribNeg SignType := { neg_neg := fun x => by cases x <;> rfl neg_mul := fun x y => by cases x <;> cases y <;> rfl mul_neg := fun x y => by cases x <;> cases y <;> rfl } def fin3Equiv : SignType ≃* Fin 3 where toFun a := match a with \| 0 => ⟨0, by simp⟩ \| 1 => ⟨1, by simp⟩ \| -1 => ⟨2, by simp⟩ invFun a := match a with \| ⟨0, _⟩ => 0 \| ⟨1, _⟩ => 1 \| ⟨2, _⟩ => -1 left_inv a := by cases a <;> rfl right_inv a := match a with \| ⟨0, _⟩ => by simp \| ⟨1, _⟩ => by simp \| ⟨2, _⟩ => by simp map_mul' a b := by cases a <;> cases b <;> rfl #align sign_type.fin3_equiv SignType.fin3Equiv section CaseBashing -- Porting note: a lot of these thms used to use decide! which is not implemented yet theorem nonneg_iff {a : SignType} : 0 ≤ a ↔ a = 0 ∨ a = 1 := by cases a <;> decide #align sign_type.nonneg_iff SignType.nonneg_iff theorem nonneg_iff_ne_neg_one {a : SignType} : 0 ≤ a ↔ a ≠ -1 := by cases a <;> decide #align sign_type.nonneg_iff_ne_neg_one SignType.nonneg_iff_ne_neg_one theorem neg_one_lt_iff {a : SignType} : -1 < a ↔ 0 ≤ a := by cases a <;> decide #align sign_type.neg_one_lt_iff SignType.neg_one_lt_iff theorem nonpos_iff {a : SignType} : a ≤ 0 ↔ a = -1 ∨ a = 0 := by cases a <;> decide #align sign_type.nonpos_iff SignType.nonpos_iff theorem nonpos_iff_ne_one {a : SignType} : a ≤ 0 ↔ a ≠ 1 := by cases a <;> decide #align sign_type.nonpos_iff_ne_one SignType.nonpos_iff_ne_one theorem lt_one_iff {a : SignType} : a < 1 ↔ a ≤ 0 := by cases a <;> decide #align sign_type.lt_one_iff SignType.lt_one_iff @[simp] theorem neg_iff {a : SignType} : a < 0 ↔ a = -1 := by cases a <;> decide #align sign_type.neg_iff SignType.neg_iff @[simp] theorem le_neg_one_iff {a : SignType} : a ≤ -1 ↔ a = -1 := le_bot_iff #align sign_type.le_neg_one_iff SignType.le_neg_one_iff @[simp]	Mathlib/Data/Sign.lean	190	190	theorem pos_iff {a : SignType} : 0 < a ↔ a = 1 := by	cases a <;> decide
import Mathlib.Analysis.Convex.Combination import Mathlib.Analysis.Convex.Join #align_import analysis.convex.stone_separation from "leanprover-community/mathlib"@"6ca1a09bc9aa75824bf97388c9e3b441fc4ccf3f" open Set variable {𝕜 E ι : Type*} [LinearOrderedField 𝕜] [AddCommGroup E] [Module 𝕜 E] {s t : Set E}	Mathlib/Analysis/Convex/StoneSeparation.lean	30	77	theorem not_disjoint_segment_convexHull_triple {p q u v x y z : E} (hz : z ∈ segment 𝕜 x y) (hu : u ∈ segment 𝕜 x p) (hv : v ∈ segment 𝕜 y q) : ¬Disjoint (segment 𝕜 u v) (convexHull 𝕜 {p, q, z}) := by	rw [not_disjoint_iff] obtain ⟨az, bz, haz, hbz, habz, rfl⟩ := hz obtain rfl \| haz' := haz.eq_or_lt · rw [zero_add] at habz rw [zero_smul, zero_add, habz, one_smul] refine ⟨v, by apply right_mem_segment, segment_subset_convexHull ?_ ?_ hv⟩ <;> simp obtain ⟨av, bv, hav, hbv, habv, rfl⟩ := hv obtain rfl \| hav' := hav.eq_or_lt · rw [zero_add] at habv rw [zero_smul, zero_add, habv, one_smul] exact ⟨q, right_mem_segment _ _ _, subset_convexHull _ _ <\| by simp⟩ obtain ⟨au, bu, hau, hbu, habu, rfl⟩ := hu have hab : 0 < az * av + bz * au := by positivity refine ⟨(az * av / (az * av + bz * au)) • (au • x + bu • p) + (bz * au / (az * av + bz * au)) • (av • y + bv • q), ⟨_, _, ?_, ?_, ?_, rfl⟩, ?_⟩ · positivity · positivity · rw [← add_div, div_self]; positivity rw [smul_add, smul_add, add_add_add_comm, add_comm, ← mul_smul, ← mul_smul] classical let w : Fin 3 → 𝕜 := ![az * av * bu, bz * au * bv, au * av] let z : Fin 3 → E := ![p, q, az • x + bz • y] have hw₀ : ∀ i, 0 ≤ w i := by rintro i fin_cases i · exact mul_nonneg (mul_nonneg haz hav) hbu · exact mul_nonneg (mul_nonneg hbz hau) hbv · exact mul_nonneg hau hav have hw : ∑ i, w i = az * av + bz * au := by trans az * av * bu + (bz * au * bv + au * av) · simp [w, Fin.sum_univ_succ, Fin.sum_univ_zero] rw [← one_mul (au * av), ← habz, add_mul, ← add_assoc, add_add_add_comm, mul_assoc, ← mul_add, mul_assoc, ← mul_add, mul_comm av, ← add_mul, ← mul_add, add_comm bu, add_comm bv, habu, habv, one_mul, mul_one] have hz : ∀ i, z i ∈ ({p, q, az • x + bz • y} : Set E) := fun i => by fin_cases i <;> simp [z] convert Finset.centerMass_mem_convexHull (Finset.univ : Finset (Fin 3)) (fun i _ => hw₀ i) (by rwa [hw]) fun i _ => hz i rw [Finset.centerMass] simp_rw [div_eq_inv_mul, hw, mul_assoc, mul_smul (az * av + bz * au)⁻¹, ← smul_add, add_assoc, ← mul_assoc] congr 3 rw [← mul_smul, ← mul_rotate, mul_right_comm, mul_smul, ← mul_smul _ av, mul_rotate, mul_smul _ bz, ← smul_add] simp only [w, z, smul_add, List.foldr, Matrix.cons_val_succ', Fin.mk_one, Matrix.cons_val_one, Matrix.head_cons, add_zero]
import Mathlib.Analysis.Convex.Between import Mathlib.Analysis.Convex.Normed import Mathlib.Analysis.Normed.Group.AddTorsor #align_import analysis.convex.side from "leanprover-community/mathlib"@"a63928c34ec358b5edcda2bf7513c50052a5230f" variable {R V V' P P' : Type*} open AffineEquiv AffineMap namespace AffineSubspace section StrictOrderedCommRing variable [StrictOrderedCommRing R] [AddCommGroup V] [Module R V] [AddTorsor V P] variable [AddCommGroup V'] [Module R V'] [AddTorsor V' P'] def WSameSide (s : AffineSubspace R P) (x y : P) : Prop := ∃ᵉ (p₁ ∈ s) (p₂ ∈ s), SameRay R (x -ᵥ p₁) (y -ᵥ p₂) #align affine_subspace.w_same_side AffineSubspace.WSameSide def SSameSide (s : AffineSubspace R P) (x y : P) : Prop := s.WSameSide x y ∧ x ∉ s ∧ y ∉ s #align affine_subspace.s_same_side AffineSubspace.SSameSide def WOppSide (s : AffineSubspace R P) (x y : P) : Prop := ∃ᵉ (p₁ ∈ s) (p₂ ∈ s), SameRay R (x -ᵥ p₁) (p₂ -ᵥ y) #align affine_subspace.w_opp_side AffineSubspace.WOppSide def SOppSide (s : AffineSubspace R P) (x y : P) : Prop := s.WOppSide x y ∧ x ∉ s ∧ y ∉ s #align affine_subspace.s_opp_side AffineSubspace.SOppSide theorem WSameSide.map {s : AffineSubspace R P} {x y : P} (h : s.WSameSide x y) (f : P →ᵃ[R] P') : (s.map f).WSameSide (f x) (f y) := by rcases h with ⟨p₁, hp₁, p₂, hp₂, h⟩ refine ⟨f p₁, mem_map_of_mem f hp₁, f p₂, mem_map_of_mem f hp₂, ?_⟩ simp_rw [← linearMap_vsub] exact h.map f.linear #align affine_subspace.w_same_side.map AffineSubspace.WSameSide.map theorem _root_.Function.Injective.wSameSide_map_iff {s : AffineSubspace R P} {x y : P} {f : P →ᵃ[R] P'} (hf : Function.Injective f) : (s.map f).WSameSide (f x) (f y) ↔ s.WSameSide x y := by refine ⟨fun h => ?_, fun h => h.map _⟩ rcases h with ⟨fp₁, hfp₁, fp₂, hfp₂, h⟩ rw [mem_map] at hfp₁ hfp₂ rcases hfp₁ with ⟨p₁, hp₁, rfl⟩ rcases hfp₂ with ⟨p₂, hp₂, rfl⟩ refine ⟨p₁, hp₁, p₂, hp₂, ?_⟩ simp_rw [← linearMap_vsub, (f.linear_injective_iff.2 hf).sameRay_map_iff] at h exact h #align function.injective.w_same_side_map_iff Function.Injective.wSameSide_map_iff theorem _root_.Function.Injective.sSameSide_map_iff {s : AffineSubspace R P} {x y : P} {f : P →ᵃ[R] P'} (hf : Function.Injective f) : (s.map f).SSameSide (f x) (f y) ↔ s.SSameSide x y := by simp_rw [SSameSide, hf.wSameSide_map_iff, mem_map_iff_mem_of_injective hf] #align function.injective.s_same_side_map_iff Function.Injective.sSameSide_map_iff @[simp] theorem _root_.AffineEquiv.wSameSide_map_iff {s : AffineSubspace R P} {x y : P} (f : P ≃ᵃ[R] P') : (s.map ↑f).WSameSide (f x) (f y) ↔ s.WSameSide x y := (show Function.Injective f.toAffineMap from f.injective).wSameSide_map_iff #align affine_equiv.w_same_side_map_iff AffineEquiv.wSameSide_map_iff @[simp] theorem _root_.AffineEquiv.sSameSide_map_iff {s : AffineSubspace R P} {x y : P} (f : P ≃ᵃ[R] P') : (s.map ↑f).SSameSide (f x) (f y) ↔ s.SSameSide x y := (show Function.Injective f.toAffineMap from f.injective).sSameSide_map_iff #align affine_equiv.s_same_side_map_iff AffineEquiv.sSameSide_map_iff theorem WOppSide.map {s : AffineSubspace R P} {x y : P} (h : s.WOppSide x y) (f : P →ᵃ[R] P') : (s.map f).WOppSide (f x) (f y) := by rcases h with ⟨p₁, hp₁, p₂, hp₂, h⟩ refine ⟨f p₁, mem_map_of_mem f hp₁, f p₂, mem_map_of_mem f hp₂, ?_⟩ simp_rw [← linearMap_vsub] exact h.map f.linear #align affine_subspace.w_opp_side.map AffineSubspace.WOppSide.map theorem _root_.Function.Injective.wOppSide_map_iff {s : AffineSubspace R P} {x y : P} {f : P →ᵃ[R] P'} (hf : Function.Injective f) : (s.map f).WOppSide (f x) (f y) ↔ s.WOppSide x y := by refine ⟨fun h => ?_, fun h => h.map _⟩ rcases h with ⟨fp₁, hfp₁, fp₂, hfp₂, h⟩ rw [mem_map] at hfp₁ hfp₂ rcases hfp₁ with ⟨p₁, hp₁, rfl⟩ rcases hfp₂ with ⟨p₂, hp₂, rfl⟩ refine ⟨p₁, hp₁, p₂, hp₂, ?_⟩ simp_rw [← linearMap_vsub, (f.linear_injective_iff.2 hf).sameRay_map_iff] at h exact h #align function.injective.w_opp_side_map_iff Function.Injective.wOppSide_map_iff theorem _root_.Function.Injective.sOppSide_map_iff {s : AffineSubspace R P} {x y : P} {f : P →ᵃ[R] P'} (hf : Function.Injective f) : (s.map f).SOppSide (f x) (f y) ↔ s.SOppSide x y := by simp_rw [SOppSide, hf.wOppSide_map_iff, mem_map_iff_mem_of_injective hf] #align function.injective.s_opp_side_map_iff Function.Injective.sOppSide_map_iff @[simp] theorem _root_.AffineEquiv.wOppSide_map_iff {s : AffineSubspace R P} {x y : P} (f : P ≃ᵃ[R] P') : (s.map ↑f).WOppSide (f x) (f y) ↔ s.WOppSide x y := (show Function.Injective f.toAffineMap from f.injective).wOppSide_map_iff #align affine_equiv.w_opp_side_map_iff AffineEquiv.wOppSide_map_iff @[simp] theorem _root_.AffineEquiv.sOppSide_map_iff {s : AffineSubspace R P} {x y : P} (f : P ≃ᵃ[R] P') : (s.map ↑f).SOppSide (f x) (f y) ↔ s.SOppSide x y := (show Function.Injective f.toAffineMap from f.injective).sOppSide_map_iff #align affine_equiv.s_opp_side_map_iff AffineEquiv.sOppSide_map_iff theorem WSameSide.nonempty {s : AffineSubspace R P} {x y : P} (h : s.WSameSide x y) : (s : Set P).Nonempty := ⟨h.choose, h.choose_spec.left⟩ #align affine_subspace.w_same_side.nonempty AffineSubspace.WSameSide.nonempty theorem SSameSide.nonempty {s : AffineSubspace R P} {x y : P} (h : s.SSameSide x y) : (s : Set P).Nonempty := ⟨h.1.choose, h.1.choose_spec.left⟩ #align affine_subspace.s_same_side.nonempty AffineSubspace.SSameSide.nonempty theorem WOppSide.nonempty {s : AffineSubspace R P} {x y : P} (h : s.WOppSide x y) : (s : Set P).Nonempty := ⟨h.choose, h.choose_spec.left⟩ #align affine_subspace.w_opp_side.nonempty AffineSubspace.WOppSide.nonempty theorem SOppSide.nonempty {s : AffineSubspace R P} {x y : P} (h : s.SOppSide x y) : (s : Set P).Nonempty := ⟨h.1.choose, h.1.choose_spec.left⟩ #align affine_subspace.s_opp_side.nonempty AffineSubspace.SOppSide.nonempty theorem SSameSide.wSameSide {s : AffineSubspace R P} {x y : P} (h : s.SSameSide x y) : s.WSameSide x y := h.1 #align affine_subspace.s_same_side.w_same_side AffineSubspace.SSameSide.wSameSide theorem SSameSide.left_not_mem {s : AffineSubspace R P} {x y : P} (h : s.SSameSide x y) : x ∉ s := h.2.1 #align affine_subspace.s_same_side.left_not_mem AffineSubspace.SSameSide.left_not_mem theorem SSameSide.right_not_mem {s : AffineSubspace R P} {x y : P} (h : s.SSameSide x y) : y ∉ s := h.2.2 #align affine_subspace.s_same_side.right_not_mem AffineSubspace.SSameSide.right_not_mem theorem SOppSide.wOppSide {s : AffineSubspace R P} {x y : P} (h : s.SOppSide x y) : s.WOppSide x y := h.1 #align affine_subspace.s_opp_side.w_opp_side AffineSubspace.SOppSide.wOppSide theorem SOppSide.left_not_mem {s : AffineSubspace R P} {x y : P} (h : s.SOppSide x y) : x ∉ s := h.2.1 #align affine_subspace.s_opp_side.left_not_mem AffineSubspace.SOppSide.left_not_mem theorem SOppSide.right_not_mem {s : AffineSubspace R P} {x y : P} (h : s.SOppSide x y) : y ∉ s := h.2.2 #align affine_subspace.s_opp_side.right_not_mem AffineSubspace.SOppSide.right_not_mem theorem wSameSide_comm {s : AffineSubspace R P} {x y : P} : s.WSameSide x y ↔ s.WSameSide y x := ⟨fun ⟨p₁, hp₁, p₂, hp₂, h⟩ => ⟨p₂, hp₂, p₁, hp₁, h.symm⟩, fun ⟨p₁, hp₁, p₂, hp₂, h⟩ => ⟨p₂, hp₂, p₁, hp₁, h.symm⟩⟩ #align affine_subspace.w_same_side_comm AffineSubspace.wSameSide_comm alias ⟨WSameSide.symm, _⟩ := wSameSide_comm #align affine_subspace.w_same_side.symm AffineSubspace.WSameSide.symm theorem sSameSide_comm {s : AffineSubspace R P} {x y : P} : s.SSameSide x y ↔ s.SSameSide y x := by rw [SSameSide, SSameSide, wSameSide_comm, and_comm (b := x ∉ s)] #align affine_subspace.s_same_side_comm AffineSubspace.sSameSide_comm alias ⟨SSameSide.symm, _⟩ := sSameSide_comm #align affine_subspace.s_same_side.symm AffineSubspace.SSameSide.symm theorem wOppSide_comm {s : AffineSubspace R P} {x y : P} : s.WOppSide x y ↔ s.WOppSide y x := by constructor · rintro ⟨p₁, hp₁, p₂, hp₂, h⟩ refine ⟨p₂, hp₂, p₁, hp₁, ?_⟩ rwa [SameRay.sameRay_comm, ← sameRay_neg_iff, neg_vsub_eq_vsub_rev, neg_vsub_eq_vsub_rev] · rintro ⟨p₁, hp₁, p₂, hp₂, h⟩ refine ⟨p₂, hp₂, p₁, hp₁, ?_⟩ rwa [SameRay.sameRay_comm, ← sameRay_neg_iff, neg_vsub_eq_vsub_rev, neg_vsub_eq_vsub_rev] #align affine_subspace.w_opp_side_comm AffineSubspace.wOppSide_comm alias ⟨WOppSide.symm, _⟩ := wOppSide_comm #align affine_subspace.w_opp_side.symm AffineSubspace.WOppSide.symm theorem sOppSide_comm {s : AffineSubspace R P} {x y : P} : s.SOppSide x y ↔ s.SOppSide y x := by rw [SOppSide, SOppSide, wOppSide_comm, and_comm (b := x ∉ s)] #align affine_subspace.s_opp_side_comm AffineSubspace.sOppSide_comm alias ⟨SOppSide.symm, _⟩ := sOppSide_comm #align affine_subspace.s_opp_side.symm AffineSubspace.SOppSide.symm theorem not_wSameSide_bot (x y : P) : ¬(⊥ : AffineSubspace R P).WSameSide x y := fun ⟨_, h, _⟩ => h.elim #align affine_subspace.not_w_same_side_bot AffineSubspace.not_wSameSide_bot theorem not_sSameSide_bot (x y : P) : ¬(⊥ : AffineSubspace R P).SSameSide x y := fun h => not_wSameSide_bot x y h.wSameSide #align affine_subspace.not_s_same_side_bot AffineSubspace.not_sSameSide_bot theorem not_wOppSide_bot (x y : P) : ¬(⊥ : AffineSubspace R P).WOppSide x y := fun ⟨_, h, _⟩ => h.elim #align affine_subspace.not_w_opp_side_bot AffineSubspace.not_wOppSide_bot theorem not_sOppSide_bot (x y : P) : ¬(⊥ : AffineSubspace R P).SOppSide x y := fun h => not_wOppSide_bot x y h.wOppSide #align affine_subspace.not_s_opp_side_bot AffineSubspace.not_sOppSide_bot @[simp] theorem wSameSide_self_iff {s : AffineSubspace R P} {x : P} : s.WSameSide x x ↔ (s : Set P).Nonempty := ⟨fun h => h.nonempty, fun ⟨p, hp⟩ => ⟨p, hp, p, hp, SameRay.rfl⟩⟩ #align affine_subspace.w_same_side_self_iff AffineSubspace.wSameSide_self_iff theorem sSameSide_self_iff {s : AffineSubspace R P} {x : P} : s.SSameSide x x ↔ (s : Set P).Nonempty ∧ x ∉ s := ⟨fun ⟨h, hx, _⟩ => ⟨wSameSide_self_iff.1 h, hx⟩, fun ⟨h, hx⟩ => ⟨wSameSide_self_iff.2 h, hx, hx⟩⟩ #align affine_subspace.s_same_side_self_iff AffineSubspace.sSameSide_self_iff theorem wSameSide_of_left_mem {s : AffineSubspace R P} {x : P} (y : P) (hx : x ∈ s) : s.WSameSide x y := by refine ⟨x, hx, x, hx, ?_⟩ rw [vsub_self] apply SameRay.zero_left #align affine_subspace.w_same_side_of_left_mem AffineSubspace.wSameSide_of_left_mem theorem wSameSide_of_right_mem {s : AffineSubspace R P} (x : P) {y : P} (hy : y ∈ s) : s.WSameSide x y := (wSameSide_of_left_mem x hy).symm #align affine_subspace.w_same_side_of_right_mem AffineSubspace.wSameSide_of_right_mem	Mathlib/Analysis/Convex/Side.lean	260	264	theorem wOppSide_of_left_mem {s : AffineSubspace R P} {x : P} (y : P) (hx : x ∈ s) : s.WOppSide x y := by	refine ⟨x, hx, x, hx, ?_⟩ rw [vsub_self] apply SameRay.zero_left
import Mathlib.LinearAlgebra.TensorProduct.Tower import Mathlib.Algebra.DirectSum.Module #align_import linear_algebra.direct_sum.tensor_product from "leanprover-community/mathlib"@"9b9d125b7be0930f564a68f1d73ace10cf46064d" suppress_compilation universe u v₁ v₂ w₁ w₁' w₂ w₂' section Ring namespace TensorProduct open TensorProduct open DirectSum open LinearMap attribute [local ext] TensorProduct.ext variable (R : Type u) [CommSemiring R] (S) [Semiring S] [Algebra R S] variable {ι₁ : Type v₁} {ι₂ : Type v₂} variable [DecidableEq ι₁] [DecidableEq ι₂] variable (M₁ : ι₁ → Type w₁) (M₁' : Type w₁') (M₂ : ι₂ → Type w₂) (M₂' : Type w₂') variable [∀ i₁, AddCommMonoid (M₁ i₁)] [AddCommMonoid M₁'] variable [∀ i₂, AddCommMonoid (M₂ i₂)] [AddCommMonoid M₂'] variable [∀ i₁, Module R (M₁ i₁)] [Module R M₁'] [∀ i₂, Module R (M₂ i₂)] [Module R M₂'] variable [∀ i₁, Module S (M₁ i₁)] [∀ i₁, IsScalarTower R S (M₁ i₁)] protected def directSum : ((⨁ i₁, M₁ i₁) ⊗[R] ⨁ i₂, M₂ i₂) ≃ₗ[S] ⨁ i : ι₁ × ι₂, M₁ i.1 ⊗[R] M₂ i.2 := by -- Porting note: entirely rewritten to allow unification to happen one step at a time refine LinearEquiv.ofLinear (R := S) (R₂ := S) ?toFun ?invFun ?left ?right · refine AlgebraTensorModule.lift ?_ refine DirectSum.toModule S _ _ fun i₁ => ?_ refine LinearMap.flip ?_ refine DirectSum.toModule R _ _ fun i₂ => LinearMap.flip <\| ?_ refine AlgebraTensorModule.curry ?_ exact DirectSum.lof S (ι₁ × ι₂) (fun i => M₁ i.1 ⊗[R] M₂ i.2) (i₁, i₂) · refine DirectSum.toModule S _ _ fun i => ?_ exact AlgebraTensorModule.map (DirectSum.lof S _ M₁ i.1) (DirectSum.lof R _ M₂ i.2) · refine DirectSum.linearMap_ext S fun ⟨i₁, i₂⟩ => ?_ refine TensorProduct.AlgebraTensorModule.ext fun m₁ m₂ => ?_ -- Porting note: seems much nicer than the `repeat` lean 3 proof. simp only [coe_comp, Function.comp_apply, toModule_lof, AlgebraTensorModule.map_tmul, AlgebraTensorModule.lift_apply, lift.tmul, coe_restrictScalars, flip_apply, AlgebraTensorModule.curry_apply, curry_apply, id_comp] · -- `(_)` prevents typeclass search timing out on problems that can be solved immediately by -- unification apply TensorProduct.AlgebraTensorModule.curry_injective refine DirectSum.linearMap_ext _ fun i₁ => ?_ refine LinearMap.ext fun x₁ => ?_ refine DirectSum.linearMap_ext _ fun i₂ => ?_ refine LinearMap.ext fun x₂ => ?_ -- Porting note: seems much nicer than the `repeat` lean 3 proof. simp only [coe_comp, Function.comp_apply, AlgebraTensorModule.curry_apply, curry_apply, coe_restrictScalars, AlgebraTensorModule.lift_apply, lift.tmul, toModule_lof, flip_apply, AlgebraTensorModule.map_tmul, id_coe, id_eq] #align tensor_product.direct_sum TensorProduct.directSum def directSumLeft : (⨁ i₁, M₁ i₁) ⊗[R] M₂' ≃ₗ[R] ⨁ i, M₁ i ⊗[R] M₂' := LinearEquiv.ofLinear (lift <\| DirectSum.toModule R _ _ fun i => (mk R _ _).compr₂ <\| DirectSum.lof R ι₁ (fun i => M₁ i ⊗[R] M₂') _) (DirectSum.toModule R _ _ fun i => rTensor _ (DirectSum.lof R ι₁ _ _)) (DirectSum.linearMap_ext R fun i => TensorProduct.ext <\| LinearMap.ext₂ fun m₁ m₂ => by dsimp only [comp_apply, compr₂_apply, id_apply, mk_apply] simp_rw [DirectSum.toModule_lof, rTensor_tmul, lift.tmul, DirectSum.toModule_lof, compr₂_apply, mk_apply]) (TensorProduct.ext <\| DirectSum.linearMap_ext R fun i => LinearMap.ext₂ fun m₁ m₂ => by dsimp only [comp_apply, compr₂_apply, id_apply, mk_apply] simp_rw [lift.tmul, DirectSum.toModule_lof, compr₂_apply, mk_apply, DirectSum.toModule_lof, rTensor_tmul]) #align tensor_product.direct_sum_left TensorProduct.directSumLeft def directSumRight : (M₁' ⊗[R] ⨁ i, M₂ i) ≃ₗ[R] ⨁ i, M₁' ⊗[R] M₂ i := TensorProduct.comm R _ _ ≪≫ₗ directSumLeft R M₂ M₁' ≪≫ₗ DFinsupp.mapRange.linearEquiv fun _ => TensorProduct.comm R _ _ #align tensor_product.direct_sum_right TensorProduct.directSumRight variable {M₁ M₁' M₂ M₂'} @[simp] theorem directSum_lof_tmul_lof (i₁ : ι₁) (m₁ : M₁ i₁) (i₂ : ι₂) (m₂ : M₂ i₂) : TensorProduct.directSum R S M₁ M₂ (DirectSum.lof S ι₁ M₁ i₁ m₁ ⊗ₜ DirectSum.lof R ι₂ M₂ i₂ m₂) = DirectSum.lof S (ι₁ × ι₂) (fun i => M₁ i.1 ⊗[R] M₂ i.2) (i₁, i₂) (m₁ ⊗ₜ m₂) := by simp [TensorProduct.directSum] #align tensor_product.direct_sum_lof_tmul_lof TensorProduct.directSum_lof_tmul_lof @[simp] theorem directSum_symm_lof_tmul (i₁ : ι₁) (m₁ : M₁ i₁) (i₂ : ι₂) (m₂ : M₂ i₂) : (TensorProduct.directSum R S M₁ M₂).symm (DirectSum.lof S (ι₁ × ι₂) (fun i => M₁ i.1 ⊗[R] M₂ i.2) (i₁, i₂) (m₁ ⊗ₜ m₂)) = (DirectSum.lof S ι₁ M₁ i₁ m₁ ⊗ₜ DirectSum.lof R ι₂ M₂ i₂ m₂) := by rw [LinearEquiv.symm_apply_eq, directSum_lof_tmul_lof] @[simp] theorem directSumLeft_tmul_lof (i : ι₁) (x : M₁ i) (y : M₂') : directSumLeft R M₁ M₂' (DirectSum.lof R _ _ i x ⊗ₜ[R] y) = DirectSum.lof R _ _ i (x ⊗ₜ[R] y) := by dsimp only [directSumLeft, LinearEquiv.ofLinear_apply, lift.tmul] rw [DirectSum.toModule_lof R i] rfl #align tensor_product.direct_sum_left_tmul_lof TensorProduct.directSumLeft_tmul_lof @[simp] theorem directSumLeft_symm_lof_tmul (i : ι₁) (x : M₁ i) (y : M₂') : (directSumLeft R M₁ M₂').symm (DirectSum.lof R _ _ i (x ⊗ₜ[R] y)) = DirectSum.lof R _ _ i x ⊗ₜ[R] y := by rw [LinearEquiv.symm_apply_eq, directSumLeft_tmul_lof] #align tensor_product.direct_sum_left_symm_lof_tmul TensorProduct.directSumLeft_symm_lof_tmul @[simp]	Mathlib/LinearAlgebra/DirectSum/TensorProduct.lean	180	185	theorem directSumRight_tmul_lof (x : M₁') (i : ι₂) (y : M₂ i) : directSumRight R M₁' M₂ (x ⊗ₜ[R] DirectSum.lof R _ _ i y) = DirectSum.lof R _ _ i (x ⊗ₜ[R] y) := by	dsimp only [directSumRight, LinearEquiv.trans_apply, TensorProduct.comm_tmul] rw [directSumLeft_tmul_lof] exact DFinsupp.mapRange_single (hf := fun _ => rfl)
import Mathlib.Analysis.Normed.Group.Quotient import Mathlib.Topology.Instances.AddCircle #align_import analysis.normed.group.add_circle from "leanprover-community/mathlib"@"084f76e20c88eae536222583331abd9468b08e1c" noncomputable section open Set open Int hiding mem_zmultiples_iff open AddSubgroup namespace AddCircle variable (p : ℝ) instance : NormedAddCommGroup (AddCircle p) := AddSubgroup.normedAddCommGroupQuotient _ @[simp] theorem norm_coe_mul (x : ℝ) (t : ℝ) : ‖(↑(t * x) : AddCircle (t * p))‖ = \|t\| * ‖(x : AddCircle p)‖ := by have aux : ∀ {a b c : ℝ}, a ∈ zmultiples b → c * a ∈ zmultiples (c * b) := fun {a b c} h => by simp only [mem_zmultiples_iff] at h ⊢ obtain ⟨n, rfl⟩ := h exact ⟨n, (mul_smul_comm n c b).symm⟩ rcases eq_or_ne t 0 with (rfl \| ht); · simp have ht' : \|t\| ≠ 0 := (not_congr abs_eq_zero).mpr ht simp only [quotient_norm_eq, Real.norm_eq_abs] conv_rhs => rw [← smul_eq_mul, ← Real.sInf_smul_of_nonneg (abs_nonneg t)] simp only [QuotientAddGroup.mk'_apply, QuotientAddGroup.eq_iff_sub_mem] congr 1 ext z rw [mem_smul_set_iff_inv_smul_mem₀ ht'] show (∃ y, y - t * x ∈ zmultiples (t * p) ∧ \|y\| = z) ↔ ∃ w, w - x ∈ zmultiples p ∧ \|w\| = \|t\|⁻¹ * z constructor · rintro ⟨y, hy, rfl⟩ refine ⟨t⁻¹ * y, ?_, by rw [abs_mul, abs_inv]⟩ rw [← inv_mul_cancel_left₀ ht x, ← inv_mul_cancel_left₀ ht p, ← mul_sub] exact aux hy · rintro ⟨w, hw, hw'⟩ refine ⟨t * w, ?_, by rw [← (eq_inv_mul_iff_mul_eq₀ ht').mp hw', abs_mul]⟩ rw [← mul_sub] exact aux hw #align add_circle.norm_coe_mul AddCircle.norm_coe_mul theorem norm_neg_period (x : ℝ) : ‖(x : AddCircle (-p))‖ = ‖(x : AddCircle p)‖ := by suffices ‖(↑(-1 * x) : AddCircle (-1 * p))‖ = ‖(x : AddCircle p)‖ by rw [← this, neg_one_mul] simp simp only [norm_coe_mul, abs_neg, abs_one, one_mul] #align add_circle.norm_neg_period AddCircle.norm_neg_period @[simp] theorem norm_eq_of_zero {x : ℝ} : ‖(x : AddCircle (0 : ℝ))‖ = \|x\| := by suffices { y : ℝ \| (y : AddCircle (0 : ℝ)) = (x : AddCircle (0 : ℝ)) } = {x} by rw [quotient_norm_eq, this, image_singleton, Real.norm_eq_abs, csInf_singleton] ext y simp [QuotientAddGroup.eq_iff_sub_mem, mem_zmultiples_iff, sub_eq_zero] #align add_circle.norm_eq_of_zero AddCircle.norm_eq_of_zero theorem norm_eq {x : ℝ} : ‖(x : AddCircle p)‖ = \|x - round (p⁻¹ * x) * p\| := by suffices ∀ x : ℝ, ‖(x : AddCircle (1 : ℝ))‖ = \|x - round x\| by rcases eq_or_ne p 0 with (rfl \| hp) · simp have hx := norm_coe_mul p x p⁻¹ rw [abs_inv, eq_inv_mul_iff_mul_eq₀ ((not_congr abs_eq_zero).mpr hp)] at hx rw [← hx, inv_mul_cancel hp, this, ← abs_mul, mul_sub, mul_inv_cancel_left₀ hp, mul_comm p] clear! x p intros x rw [quotient_norm_eq, abs_sub_round_eq_min] have h₁ : BddBelow (abs '' { m : ℝ \| (m : AddCircle (1 : ℝ)) = x }) := ⟨0, by simp [mem_lowerBounds]⟩ have h₂ : (abs '' { m : ℝ \| (m : AddCircle (1 : ℝ)) = x }).Nonempty := ⟨\|x\|, ⟨x, rfl, rfl⟩⟩ apply le_antisymm · simp_rw [Real.norm_eq_abs, csInf_le_iff h₁ h₂, le_min_iff] intro b h refine ⟨mem_lowerBounds.1 h _ ⟨fract x, ?_, abs_fract⟩, mem_lowerBounds.1 h _ ⟨fract x - 1, ?_, by rw [abs_sub_comm, abs_one_sub_fract]⟩⟩ · simp only [mem_setOf, fract, sub_eq_self, QuotientAddGroup.mk_sub, QuotientAddGroup.eq_zero_iff, intCast_mem_zmultiples_one] · simp only [mem_setOf, fract, sub_eq_self, QuotientAddGroup.mk_sub, QuotientAddGroup.eq_zero_iff, intCast_mem_zmultiples_one, sub_sub, (by norm_cast : (⌊x⌋ : ℝ) + 1 = (↑(⌊x⌋ + 1) : ℝ))] · simp only [QuotientAddGroup.mk'_apply, Real.norm_eq_abs, le_csInf_iff h₁ h₂] rintro b' ⟨b, hb, rfl⟩ simp only [mem_setOf, QuotientAddGroup.eq_iff_sub_mem, mem_zmultiples_iff, smul_one_eq_cast] at hb obtain ⟨z, hz⟩ := hb rw [(by rw [hz]; abel : x = b - z), fract_sub_int, ← abs_sub_round_eq_min] convert round_le b 0 simp #align add_circle.norm_eq AddCircle.norm_eq theorem norm_eq' (hp : 0 < p) {x : ℝ} : ‖(x : AddCircle p)‖ = p * \|p⁻¹ * x - round (p⁻¹ * x)\| := by conv_rhs => congr rw [← abs_eq_self.mpr hp.le] rw [← abs_mul, mul_sub, mul_inv_cancel_left₀ hp.ne.symm, norm_eq, mul_comm p] #align add_circle.norm_eq' AddCircle.norm_eq' theorem norm_le_half_period {x : AddCircle p} (hp : p ≠ 0) : ‖x‖ ≤ \|p\| / 2 := by obtain ⟨x⟩ := x change ‖(x : AddCircle p)‖ ≤ \|p\| / 2 rw [norm_eq, ← mul_le_mul_left (abs_pos.mpr (inv_ne_zero hp)), ← abs_mul, mul_sub, mul_left_comm, ← mul_div_assoc, ← abs_mul, inv_mul_cancel hp, mul_one, abs_one] exact abs_sub_round (p⁻¹ * x) #align add_circle.norm_le_half_period AddCircle.norm_le_half_period @[simp] theorem norm_half_period_eq : ‖(↑(p / 2) : AddCircle p)‖ = \|p\| / 2 := by rcases eq_or_ne p 0 with (rfl \| hp); · simp rw [norm_eq, ← mul_div_assoc, inv_mul_cancel hp, one_div, round_two_inv, Int.cast_one, one_mul, (by linarith : p / 2 - p = -(p / 2)), abs_neg, abs_div, abs_two] #align add_circle.norm_half_period_eq AddCircle.norm_half_period_eq theorem norm_coe_eq_abs_iff {x : ℝ} (hp : p ≠ 0) : ‖(x : AddCircle p)‖ = \|x\| ↔ \|x\| ≤ \|p\| / 2 := by refine ⟨fun hx => hx ▸ norm_le_half_period p hp, fun hx => ?_⟩ suffices ∀ p : ℝ, 0 < p → \|x\| ≤ p / 2 → ‖(x : AddCircle p)‖ = \|x\| by -- Porting note: replaced `lt_trichotomy` which had trouble substituting `p = 0`. rcases hp.symm.lt_or_lt with (hp \| hp) · rw [abs_eq_self.mpr hp.le] at hx exact this p hp hx · rw [← norm_neg_period] rw [abs_eq_neg_self.mpr hp.le] at hx exact this (-p) (neg_pos.mpr hp) hx clear hx intro p hp hx rcases eq_or_ne x (p / (2 : ℝ)) with (rfl \| hx') · simp [abs_div, abs_two] suffices round (p⁻¹ * x) = 0 by simp [norm_eq, this] rw [round_eq_zero_iff] obtain ⟨hx₁, hx₂⟩ := abs_le.mp hx replace hx₂ := Ne.lt_of_le hx' hx₂ constructor · rwa [← mul_le_mul_left hp, ← mul_assoc, mul_inv_cancel hp.ne.symm, one_mul, mul_neg, ← mul_div_assoc, mul_one] · rwa [← mul_lt_mul_left hp, ← mul_assoc, mul_inv_cancel hp.ne.symm, one_mul, ← mul_div_assoc, mul_one] #align add_circle.norm_coe_eq_abs_iff AddCircle.norm_coe_eq_abs_iff open Metric theorem closedBall_eq_univ_of_half_period_le (hp : p ≠ 0) (x : AddCircle p) {ε : ℝ} (hε : \|p\| / 2 ≤ ε) : closedBall x ε = univ := eq_univ_iff_forall.mpr fun x => by simpa only [mem_closedBall, dist_eq_norm] using (norm_le_half_period p hp).trans hε #align add_circle.closed_ball_eq_univ_of_half_period_le AddCircle.closedBall_eq_univ_of_half_period_le @[simp] theorem coe_real_preimage_closedBall_period_zero (x ε : ℝ) : (↑) ⁻¹' closedBall (x : AddCircle (0 : ℝ)) ε = closedBall x ε := by ext y -- Porting note: squeezed the simp simp only [Set.mem_preimage, dist_eq_norm, AddCircle.norm_eq_of_zero, iff_self, ← QuotientAddGroup.mk_sub, Metric.mem_closedBall, Real.norm_eq_abs] #align add_circle.coe_real_preimage_closed_ball_period_zero AddCircle.coe_real_preimage_closedBall_period_zero theorem coe_real_preimage_closedBall_eq_iUnion (x ε : ℝ) : (↑) ⁻¹' closedBall (x : AddCircle p) ε = ⋃ z : ℤ, closedBall (x + z • p) ε := by rcases eq_or_ne p 0 with (rfl \| hp) · simp [iUnion_const] ext y simp only [dist_eq_norm, mem_preimage, mem_closedBall, zsmul_eq_mul, mem_iUnion, Real.norm_eq_abs, ← QuotientAddGroup.mk_sub, norm_eq, ← sub_sub] refine ⟨fun h => ⟨round (p⁻¹ * (y - x)), h⟩, ?_⟩ rintro ⟨n, hn⟩ rw [← mul_le_mul_left (abs_pos.mpr <\| inv_ne_zero hp), ← abs_mul, mul_sub, mul_comm _ p, inv_mul_cancel_left₀ hp] at hn ⊢ exact (round_le (p⁻¹ * (y - x)) n).trans hn #align add_circle.coe_real_preimage_closed_ball_eq_Union AddCircle.coe_real_preimage_closedBall_eq_iUnion theorem coe_real_preimage_closedBall_inter_eq {x ε : ℝ} (s : Set ℝ) (hs : s ⊆ closedBall x (\|p\| / 2)) : (↑) ⁻¹' closedBall (x : AddCircle p) ε ∩ s = if ε < \|p\| / 2 then closedBall x ε ∩ s else s := by rcases le_or_lt (\|p\| / 2) ε with hε \| hε · rcases eq_or_ne p 0 with (rfl \| hp) · simp only [abs_zero, zero_div] at hε simp only [not_lt.mpr hε, coe_real_preimage_closedBall_period_zero, abs_zero, zero_div, if_false, inter_eq_right] exact hs.trans (closedBall_subset_closedBall <\| by simp [hε]) -- Porting note: was -- simp [closedBall_eq_univ_of_half_period_le p hp (↑x) hε, not_lt.mpr hε] simp only [not_lt.mpr hε, ite_false, inter_eq_right] rw [closedBall_eq_univ_of_half_period_le p hp (↑x : ℝ ⧸ zmultiples p) hε, preimage_univ] apply subset_univ · suffices ∀ z : ℤ, closedBall (x + z • p) ε ∩ s = if z = 0 then closedBall x ε ∩ s else ∅ by simp [-zsmul_eq_mul, ← QuotientAddGroup.mk_zero, coe_real_preimage_closedBall_eq_iUnion, iUnion_inter, iUnion_ite, this, hε] intro z simp only [Real.closedBall_eq_Icc, zero_sub, zero_add] at hs ⊢ rcases eq_or_ne z 0 with (rfl \| hz) · simp simp only [hz, zsmul_eq_mul, if_false, eq_empty_iff_forall_not_mem] rintro y ⟨⟨hy₁, hy₂⟩, hy₀⟩ obtain ⟨hy₃, hy₄⟩ := hs hy₀ rcases lt_trichotomy 0 p with (hp \| (rfl : 0 = p) \| hp) · cases' Int.cast_le_neg_one_or_one_le_cast_of_ne_zero ℝ hz with hz' hz' · have : ↑z * p ≤ -p := by nlinarith linarith [abs_eq_self.mpr hp.le] · have : p ≤ ↑z * p := by nlinarith linarith [abs_eq_self.mpr hp.le] · simp only [mul_zero, add_zero, abs_zero, zero_div] at hy₁ hy₂ hε linarith · cases' Int.cast_le_neg_one_or_one_le_cast_of_ne_zero ℝ hz with hz' hz' · have : -p ≤ ↑z * p := by nlinarith linarith [abs_eq_neg_self.mpr hp.le] · have : ↑z * p ≤ p := by nlinarith linarith [abs_eq_neg_self.mpr hp.le] #align add_circle.coe_real_preimage_closed_ball_inter_eq AddCircle.coe_real_preimage_closedBall_inter_eq section FiniteOrderPoints variable {p} [hp : Fact (0 < p)] theorem norm_div_natCast {m n : ℕ} : ‖(↑(↑m / ↑n * p) : AddCircle p)‖ = p * (↑(min (m % n) (n - m % n)) / n) := by have : p⁻¹ * (↑m / ↑n * p) = ↑m / ↑n := by rw [mul_comm _ p, inv_mul_cancel_left₀ hp.out.ne.symm] rw [norm_eq' p hp.out, this, abs_sub_round_div_natCast_eq] #align add_circle.norm_div_nat_cast AddCircle.norm_div_natCast @[deprecated (since := "2024-04-17")] alias norm_div_nat_cast := norm_div_natCast	Mathlib/Analysis/Normed/Group/AddCircle.lean	250	256	theorem exists_norm_eq_of_isOfFinAddOrder {u : AddCircle p} (hu : IsOfFinAddOrder u) : ∃ k : ℕ, ‖u‖ = p * (k / addOrderOf u) := by	let n := addOrderOf u change ∃ k : ℕ, ‖u‖ = p * (k / n) obtain ⟨m, -, -, hm⟩ := exists_gcd_eq_one_of_isOfFinAddOrder hu refine ⟨min (m % n) (n - m % n), ?_⟩ rw [← hm, norm_div_natCast]
import Mathlib.Topology.CompactOpen import Mathlib.Topology.LocallyFinite import Mathlib.Topology.ProperMap import Mathlib.Topology.UniformSpace.UniformConvergenceTopology #align_import topology.uniform_space.compact_convergence from "leanprover-community/mathlib"@"dc6c365e751e34d100e80fe6e314c3c3e0fd2988" universe u₁ u₂ u₃ open scoped Uniformity Topology UniformConvergence open UniformSpace Set Filter variable {α : Type u₁} {β : Type u₂} [TopologicalSpace α] [UniformSpace β] variable (K : Set α) (V : Set (β × β)) (f : C(α, β)) namespace ContinuousMap theorem tendsto_iff_forall_compact_tendstoUniformlyOn {ι : Type u₃} {p : Filter ι} {F : ι → C(α, β)} {f} : Tendsto F p (𝓝 f) ↔ ∀ K, IsCompact K → TendstoUniformlyOn (fun i a => F i a) f p K := by rw [tendsto_nhds_compactOpen] constructor · -- Let us prove that convergence in the compact-open topology -- implies uniform convergence on compacts. -- Consider a compact set `K` intro h K hK -- Since `K` is compact, it suffices to prove locally uniform convergence rw [← tendstoLocallyUniformlyOn_iff_tendstoUniformlyOn_of_compact hK] -- Now choose an entourage `U` in the codomain and a point `x ∈ K`. intro U hU x _ -- Choose an open symmetric entourage `V` such that `V ○ V ⊆ U`. rcases comp_open_symm_mem_uniformity_sets hU with ⟨V, hV, hVo, hVsymm, hVU⟩ -- Then choose a closed entourage `W ⊆ V` rcases mem_uniformity_isClosed hV with ⟨W, hW, hWc, hWU⟩ -- Consider `s = {y ∈ K \| (f x, f y) ∈ W}` set s := K ∩ f ⁻¹' ball (f x) W -- This is a neighbourhood of `x` within `K`, because `W` is an entourage. have hnhds : s ∈ 𝓝[K] x := inter_mem_nhdsWithin _ <\| f.continuousAt _ (ball_mem_nhds _ hW) -- This set is compact because it is an intersection of `K` -- with a closed set `{y \| (f x, f y) ∈ W} = f ⁻¹' UniformSpace.ball (f x) W` have hcomp : IsCompact s := hK.inter_right <\| (isClosed_ball _ hWc).preimage f.continuous -- `f` maps `s` to the open set `ball (f x) V = {z \| (f x, z) ∈ V}` have hmaps : MapsTo f s (ball (f x) V) := fun x hx ↦ hWU hx.2 use s, hnhds -- Continuous maps `F i` in a neighbourhood of `f` map `s` to `ball (f x) V` as well. refine (h s hcomp _ (isOpen_ball _ hVo) hmaps).mono fun g hg y hy ↦ ?_ -- Then for `y ∈ s` we have `(f y, f x) ∈ V` and `(f x, F i y) ∈ V`, thus `(f y, F i y) ∈ U` exact hVU ⟨f x, hVsymm.mk_mem_comm.2 <\| hmaps hy, hg hy⟩ · -- Now we prove that uniform convergence on compacts -- implies convergence in the compact-open topology -- Consider a compact set `K`, an open set `U`, and a continuous map `f` that maps `K` to `U` intro h K hK U hU hf -- Due to Lebesgue number lemma, there exists an entourage `V` -- such that `U` includes the `V`-thickening of `f '' K`. rcases lebesgue_number_of_compact_open (hK.image (map_continuous f)) hU hf.image_subset with ⟨V, hV, -, hVf⟩ -- Then any continuous map that is uniformly `V`-close to `f` on `K` -- maps `K` to `U` as well filter_upwards [h K hK V hV] with g hg x hx using hVf _ (mem_image_of_mem f hx) (hg x hx) #align continuous_map.tendsto_iff_forall_compact_tendsto_uniformly_on ContinuousMap.tendsto_iff_forall_compact_tendstoUniformlyOn def toUniformOnFunIsCompact (f : C(α, β)) : α →ᵤ[{K \| IsCompact K}] β := UniformOnFun.ofFun {K \| IsCompact K} f @[simp] theorem toUniformOnFun_toFun (f : C(α, β)) : UniformOnFun.toFun _ f.toUniformOnFunIsCompact = f := rfl open UniformSpace in instance compactConvergenceUniformSpace : UniformSpace C(α, β) := .replaceTopology (.comap toUniformOnFunIsCompact inferInstance) <\| by refine TopologicalSpace.ext_nhds fun f ↦ eq_of_forall_le_iff fun l ↦ ?_ simp_rw [← tendsto_id', tendsto_iff_forall_compact_tendstoUniformlyOn, nhds_induced, tendsto_comap_iff, UniformOnFun.tendsto_iff_tendstoUniformlyOn] rfl #align continuous_map.compact_convergence_uniform_space ContinuousMap.compactConvergenceUniformSpace theorem uniformEmbedding_toUniformOnFunIsCompact : UniformEmbedding (toUniformOnFunIsCompact : C(α, β) → α →ᵤ[{K \| IsCompact K}] β) where comap_uniformity := rfl inj := DFunLike.coe_injective -- The following definitions and theorems -- used to be a part of the construction of the `UniformSpace C(α, β)` structure -- before it was migrated to `UniformOnFun` #noalign continuous_map.compact_conv_nhd #noalign continuous_map.self_mem_compact_conv_nhd #noalign continuous_map.compact_conv_nhd_mono #noalign continuous_map.compact_conv_nhd_mem_comp #noalign continuous_map.compact_conv_nhd_nhd_basis #noalign continuous_map.compact_conv_nhd_subset_inter #noalign continuous_map.compact_conv_nhd_compact_entourage_nonempty #noalign continuous_map.compact_conv_nhd_filter_is_basis #noalign continuous_map.compact_convergence_filter_basis #noalign continuous_map.mem_compact_convergence_nhd_filter #noalign continuous_map.compact_convergence_topology #noalign continuous_map.nhds_compact_convergence #noalign continuous_map.has_basis_nhds_compact_convergence #noalign continuous_map.tendsto_iff_forall_compact_tendsto_uniformly_on' #noalign continuous_map.compact_conv_nhd_subset_compact_open #noalign continuous_map.Inter_compact_open_gen_subset_compact_conv_nhd #noalign continuous_map.compact_open_eq_compact_convergence #noalign continuous_map.compact_convergence_uniformity #noalign continuous_map.has_basis_compact_convergence_uniformity_aux #noalign continuous_map.mem_compact_convergence_uniformity	Mathlib/Topology/UniformSpace/CompactConvergence.lean	203	209	theorem _root_.Filter.HasBasis.compactConvergenceUniformity {ι : Type*} {pi : ι → Prop} {s : ι → Set (β × β)} (h : (𝓤 β).HasBasis pi s) : HasBasis (𝓤 C(α, β)) (fun p : Set α × ι => IsCompact p.1 ∧ pi p.2) fun p => { fg : C(α, β) × C(α, β) \| ∀ x ∈ p.1, (fg.1 x, fg.2 x) ∈ s p.2 } := by	rw [← uniformEmbedding_toUniformOnFunIsCompact.comap_uniformity] exact .comap _ <\| UniformOnFun.hasBasis_uniformity_of_basis _ _ {K \| IsCompact K} ⟨∅, isCompact_empty⟩ (directedOn_of_sup_mem fun _ _ ↦ IsCompact.union) h
import Mathlib.Analysis.SpecialFunctions.ExpDeriv #align_import analysis.ODE.gronwall from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" variable {E : Type} [NormedAddCommGroup E] [NormedSpace ℝ E] {F : Type} [NormedAddCommGroup F] [NormedSpace ℝ F] open Metric Set Asymptotics Filter Real open scoped Classical Topology NNReal noncomputable def gronwallBound (δ K ε x : ℝ) : ℝ := if K = 0 then δ + ε * x else δ * exp (K * x) + ε / K * (exp (K * x) - 1) #align gronwall_bound gronwallBound theorem gronwallBound_K0 (δ ε : ℝ) : gronwallBound δ 0 ε = fun x => δ + ε * x := funext fun _ => if_pos rfl set_option linter.uppercaseLean3 false in #align gronwall_bound_K0 gronwallBound_K0 theorem gronwallBound_of_K_ne_0 {δ K ε : ℝ} (hK : K ≠ 0) : gronwallBound δ K ε = fun x => δ * exp (K * x) + ε / K * (exp (K * x) - 1) := funext fun _ => if_neg hK set_option linter.uppercaseLean3 false in #align gronwall_bound_of_K_ne_0 gronwallBound_of_K_ne_0 theorem hasDerivAt_gronwallBound (δ K ε x : ℝ) : HasDerivAt (gronwallBound δ K ε) (K * gronwallBound δ K ε x + ε) x := by by_cases hK : K = 0 · subst K simp only [gronwallBound_K0, zero_mul, zero_add] convert ((hasDerivAt_id x).const_mul ε).const_add δ rw [mul_one] · simp only [gronwallBound_of_K_ne_0 hK] convert (((hasDerivAt_id x).const_mul K).exp.const_mul δ).add ((((hasDerivAt_id x).const_mul K).exp.sub_const 1).const_mul (ε / K)) using 1 simp only [id, mul_add, (mul_assoc _ _ _).symm, mul_comm _ K, mul_div_cancel₀ _ hK] ring #align has_deriv_at_gronwall_bound hasDerivAt_gronwallBound theorem hasDerivAt_gronwallBound_shift (δ K ε x a : ℝ) : HasDerivAt (fun y => gronwallBound δ K ε (y - a)) (K * gronwallBound δ K ε (x - a) + ε) x := by convert (hasDerivAt_gronwallBound δ K ε _).comp x ((hasDerivAt_id x).sub_const a) using 1 rw [id, mul_one] #align has_deriv_at_gronwall_bound_shift hasDerivAt_gronwallBound_shift	Mathlib/Analysis/ODE/Gronwall.lean	79	83	theorem gronwallBound_x0 (δ K ε : ℝ) : gronwallBound δ K ε 0 = δ := by	by_cases hK : K = 0 · simp only [gronwallBound, if_pos hK, mul_zero, add_zero] · simp only [gronwallBound, if_neg hK, mul_zero, exp_zero, sub_self, mul_one, add_zero]
import Mathlib.Data.Nat.Defs import Mathlib.Order.Interval.Set.Basic import Mathlib.Tactic.Monotonicity.Attr #align_import data.nat.log from "leanprover-community/mathlib"@"3e00d81bdcbf77c8188bbd18f5524ddc3ed8cac6" namespace Nat --@[pp_nodot] porting note: unknown attribute def log (b : ℕ) : ℕ → ℕ \| n => if h : b ≤ n ∧ 1 < b then log b (n / b) + 1 else 0 decreasing_by -- putting this in the def triggers the `unusedHavesSuffices` linter: -- https://github.com/leanprover-community/batteries/issues/428 have : n / b < n := div_lt_self ((Nat.zero_lt_one.trans h.2).trans_le h.1) h.2 decreasing_trivial #align nat.log Nat.log @[simp] theorem log_eq_zero_iff {b n : ℕ} : log b n = 0 ↔ n < b ∨ b ≤ 1 := by rw [log, dite_eq_right_iff] simp only [Nat.add_eq_zero_iff, Nat.one_ne_zero, and_false, imp_false, not_and_or, not_le, not_lt] #align nat.log_eq_zero_iff Nat.log_eq_zero_iff theorem log_of_lt {b n : ℕ} (hb : n < b) : log b n = 0 := log_eq_zero_iff.2 (Or.inl hb) #align nat.log_of_lt Nat.log_of_lt theorem log_of_left_le_one {b : ℕ} (hb : b ≤ 1) (n) : log b n = 0 := log_eq_zero_iff.2 (Or.inr hb) #align nat.log_of_left_le_one Nat.log_of_left_le_one @[simp] theorem log_pos_iff {b n : ℕ} : 0 < log b n ↔ b ≤ n ∧ 1 < b := by rw [Nat.pos_iff_ne_zero, Ne, log_eq_zero_iff, not_or, not_lt, not_le] #align nat.log_pos_iff Nat.log_pos_iff theorem log_pos {b n : ℕ} (hb : 1 < b) (hbn : b ≤ n) : 0 < log b n := log_pos_iff.2 ⟨hbn, hb⟩ #align nat.log_pos Nat.log_pos theorem log_of_one_lt_of_le {b n : ℕ} (h : 1 < b) (hn : b ≤ n) : log b n = log b (n / b) + 1 := by rw [log] exact if_pos ⟨hn, h⟩ #align nat.log_of_one_lt_of_le Nat.log_of_one_lt_of_le @[simp] lemma log_zero_left : ∀ n, log 0 n = 0 := log_of_left_le_one $ Nat.zero_le _ #align nat.log_zero_left Nat.log_zero_left @[simp] theorem log_zero_right (b : ℕ) : log b 0 = 0 := log_eq_zero_iff.2 (le_total 1 b) #align nat.log_zero_right Nat.log_zero_right @[simp] theorem log_one_left : ∀ n, log 1 n = 0 := log_of_left_le_one le_rfl #align nat.log_one_left Nat.log_one_left @[simp] theorem log_one_right (b : ℕ) : log b 1 = 0 := log_eq_zero_iff.2 (lt_or_le _ _) #align nat.log_one_right Nat.log_one_right theorem pow_le_iff_le_log {b : ℕ} (hb : 1 < b) {x y : ℕ} (hy : y ≠ 0) : b ^ x ≤ y ↔ x ≤ log b y := by induction' y using Nat.strong_induction_on with y ih generalizing x cases x with \| zero => dsimp; omega \| succ x => rw [log]; split_ifs with h · have b_pos : 0 < b := lt_of_succ_lt hb rw [Nat.add_le_add_iff_right, ← ih (y / b) (div_lt_self (Nat.pos_iff_ne_zero.2 hy) hb) (Nat.div_pos h.1 b_pos).ne', le_div_iff_mul_le b_pos, pow_succ', Nat.mul_comm] · exact iff_of_false (fun hby => h ⟨(le_self_pow x.succ_ne_zero _).trans hby, hb⟩) (not_succ_le_zero _) #align nat.pow_le_iff_le_log Nat.pow_le_iff_le_log theorem lt_pow_iff_log_lt {b : ℕ} (hb : 1 < b) {x y : ℕ} (hy : y ≠ 0) : y < b ^ x ↔ log b y < x := lt_iff_lt_of_le_iff_le (pow_le_iff_le_log hb hy) #align nat.lt_pow_iff_log_lt Nat.lt_pow_iff_log_lt theorem pow_le_of_le_log {b x y : ℕ} (hy : y ≠ 0) (h : x ≤ log b y) : b ^ x ≤ y := by refine (le_or_lt b 1).elim (fun hb => ?_) fun hb => (pow_le_iff_le_log hb hy).2 h rw [log_of_left_le_one hb, Nat.le_zero] at h rwa [h, Nat.pow_zero, one_le_iff_ne_zero] #align nat.pow_le_of_le_log Nat.pow_le_of_le_log theorem le_log_of_pow_le {b x y : ℕ} (hb : 1 < b) (h : b ^ x ≤ y) : x ≤ log b y := by rcases ne_or_eq y 0 with (hy \| rfl) exacts [(pow_le_iff_le_log hb hy).1 h, (h.not_lt (Nat.pow_pos (Nat.zero_lt_one.trans hb))).elim] #align nat.le_log_of_pow_le Nat.le_log_of_pow_le theorem pow_log_le_self (b : ℕ) {x : ℕ} (hx : x ≠ 0) : b ^ log b x ≤ x := pow_le_of_le_log hx le_rfl #align nat.pow_log_le_self Nat.pow_log_le_self theorem log_lt_of_lt_pow {b x y : ℕ} (hy : y ≠ 0) : y < b ^ x → log b y < x := lt_imp_lt_of_le_imp_le (pow_le_of_le_log hy) #align nat.log_lt_of_lt_pow Nat.log_lt_of_lt_pow theorem lt_pow_of_log_lt {b x y : ℕ} (hb : 1 < b) : log b y < x → y < b ^ x := lt_imp_lt_of_le_imp_le (le_log_of_pow_le hb) #align nat.lt_pow_of_log_lt Nat.lt_pow_of_log_lt theorem lt_pow_succ_log_self {b : ℕ} (hb : 1 < b) (x : ℕ) : x < b ^ (log b x).succ := lt_pow_of_log_lt hb (lt_succ_self _) #align nat.lt_pow_succ_log_self Nat.lt_pow_succ_log_self theorem log_eq_iff {b m n : ℕ} (h : m ≠ 0 ∨ 1 < b ∧ n ≠ 0) : log b n = m ↔ b ^ m ≤ n ∧ n < b ^ (m + 1) := by rcases em (1 < b ∧ n ≠ 0) with (⟨hb, hn⟩ \| hbn) · rw [le_antisymm_iff, ← Nat.lt_succ_iff, ← pow_le_iff_le_log, ← lt_pow_iff_log_lt, and_comm] <;> assumption have hm : m ≠ 0 := h.resolve_right hbn rw [not_and_or, not_lt, Ne, not_not] at hbn rcases hbn with (hb \| rfl) · obtain rfl \| rfl := le_one_iff_eq_zero_or_eq_one.1 hb any_goals simp only [ne_eq, zero_eq, reduceSucc, lt_self_iff_false, not_lt_zero, false_and, or_false] at h simp [h, eq_comm (a := 0), Nat.zero_pow (Nat.pos_iff_ne_zero.2 _)] <;> omega · simp [@eq_comm _ 0, hm] #align nat.log_eq_iff Nat.log_eq_iff theorem log_eq_of_pow_le_of_lt_pow {b m n : ℕ} (h₁ : b ^ m ≤ n) (h₂ : n < b ^ (m + 1)) : log b n = m := by rcases eq_or_ne m 0 with (rfl \| hm) · rw [Nat.pow_one] at h₂ exact log_of_lt h₂ · exact (log_eq_iff (Or.inl hm)).2 ⟨h₁, h₂⟩ #align nat.log_eq_of_pow_le_of_lt_pow Nat.log_eq_of_pow_le_of_lt_pow theorem log_pow {b : ℕ} (hb : 1 < b) (x : ℕ) : log b (b ^ x) = x := log_eq_of_pow_le_of_lt_pow le_rfl (Nat.pow_lt_pow_right hb x.lt_succ_self) #align nat.log_pow Nat.log_pow theorem log_eq_one_iff' {b n : ℕ} : log b n = 1 ↔ b ≤ n ∧ n < b * b := by rw [log_eq_iff (Or.inl Nat.one_ne_zero), Nat.pow_add, Nat.pow_one] #align nat.log_eq_one_iff' Nat.log_eq_one_iff' theorem log_eq_one_iff {b n : ℕ} : log b n = 1 ↔ n < b * b ∧ 1 < b ∧ b ≤ n := log_eq_one_iff'.trans ⟨fun h => ⟨h.2, lt_mul_self_iff.1 (h.1.trans_lt h.2), h.1⟩, fun h => ⟨h.2.2, h.1⟩⟩ #align nat.log_eq_one_iff Nat.log_eq_one_iff theorem log_mul_base {b n : ℕ} (hb : 1 < b) (hn : n ≠ 0) : log b (n * b) = log b n + 1 := by apply log_eq_of_pow_le_of_lt_pow <;> rw [pow_succ', Nat.mul_comm b] exacts [Nat.mul_le_mul_right _ (pow_log_le_self _ hn), (Nat.mul_lt_mul_right (Nat.zero_lt_one.trans hb)).2 (lt_pow_succ_log_self hb _)] #align nat.log_mul_base Nat.log_mul_base theorem pow_log_le_add_one (b : ℕ) : ∀ x, b ^ log b x ≤ x + 1 \| 0 => by rw [log_zero_right, Nat.pow_zero] \| x + 1 => (pow_log_le_self b x.succ_ne_zero).trans (x + 1).le_succ #align nat.pow_log_le_add_one Nat.pow_log_le_add_one theorem log_monotone {b : ℕ} : Monotone (log b) := by refine monotone_nat_of_le_succ fun n => ?_ rcases le_or_lt b 1 with hb \| hb · rw [log_of_left_le_one hb] exact zero_le _ · exact le_log_of_pow_le hb (pow_log_le_add_one _ _) #align nat.log_monotone Nat.log_monotone @[mono] theorem log_mono_right {b n m : ℕ} (h : n ≤ m) : log b n ≤ log b m := log_monotone h #align nat.log_mono_right Nat.log_mono_right @[mono] theorem log_anti_left {b c n : ℕ} (hc : 1 < c) (hb : c ≤ b) : log b n ≤ log c n := by rcases eq_or_ne n 0 with (rfl \| hn); · rw [log_zero_right, log_zero_right] apply le_log_of_pow_le hc calc c ^ log b n ≤ b ^ log b n := Nat.pow_le_pow_left hb _ _ ≤ n := pow_log_le_self _ hn #align nat.log_anti_left Nat.log_anti_left theorem log_antitone_left {n : ℕ} : AntitoneOn (fun b => log b n) (Set.Ioi 1) := fun _ hc _ _ hb => log_anti_left (Set.mem_Iio.1 hc) hb #align nat.log_antitone_left Nat.log_antitone_left @[simp] theorem log_div_base (b n : ℕ) : log b (n / b) = log b n - 1 := by rcases le_or_lt b 1 with hb \| hb · rw [log_of_left_le_one hb, log_of_left_le_one hb, Nat.zero_sub] cases' lt_or_le n b with h h · rw [div_eq_of_lt h, log_of_lt h, log_zero_right] rw [log_of_one_lt_of_le hb h, Nat.add_sub_cancel_right] #align nat.log_div_base Nat.log_div_base @[simp] theorem log_div_mul_self (b n : ℕ) : log b (n / b * b) = log b n := by rcases le_or_lt b 1 with hb \| hb · rw [log_of_left_le_one hb, log_of_left_le_one hb] cases' lt_or_le n b with h h · rw [div_eq_of_lt h, Nat.zero_mul, log_zero_right, log_of_lt h] rw [log_mul_base hb (Nat.div_pos h (by omega)).ne', log_div_base, Nat.sub_add_cancel (succ_le_iff.2 <\| log_pos hb h)] #align nat.log_div_mul_self Nat.log_div_mul_self theorem add_pred_div_lt {b n : ℕ} (hb : 1 < b) (hn : 2 ≤ n) : (n + b - 1) / b < n := by rw [div_lt_iff_lt_mul (by omega), ← succ_le_iff, ← pred_eq_sub_one, succ_pred_eq_of_pos (by omega)] exact Nat.add_le_mul hn hb -- Porting note: Was private in mathlib 3 -- #align nat.add_pred_div_lt Nat.add_pred_div_lt --@[pp_nodot] def clog (b : ℕ) : ℕ → ℕ \| n => if h : 1 < b ∧ 1 < n then clog b ((n + b - 1) / b) + 1 else 0 decreasing_by -- putting this in the def triggers the `unusedHavesSuffices` linter: -- https://github.com/leanprover-community/batteries/issues/428 have : (n + b - 1) / b < n := add_pred_div_lt h.1 h.2 decreasing_trivial #align nat.clog Nat.clog theorem clog_of_left_le_one {b : ℕ} (hb : b ≤ 1) (n : ℕ) : clog b n = 0 := by rw [clog, dif_neg fun h : 1 < b ∧ 1 < n => h.1.not_le hb] #align nat.clog_of_left_le_one Nat.clog_of_left_le_one theorem clog_of_right_le_one {n : ℕ} (hn : n ≤ 1) (b : ℕ) : clog b n = 0 := by rw [clog, dif_neg fun h : 1 < b ∧ 1 < n => h.2.not_le hn] #align nat.clog_of_right_le_one Nat.clog_of_right_le_one @[simp] lemma clog_zero_left (n : ℕ) : clog 0 n = 0 := clog_of_left_le_one (Nat.zero_le _) _ #align nat.clog_zero_left Nat.clog_zero_left @[simp] lemma clog_zero_right (b : ℕ) : clog b 0 = 0 := clog_of_right_le_one (Nat.zero_le _) _ #align nat.clog_zero_right Nat.clog_zero_right @[simp] theorem clog_one_left (n : ℕ) : clog 1 n = 0 := clog_of_left_le_one le_rfl _ #align nat.clog_one_left Nat.clog_one_left @[simp] theorem clog_one_right (b : ℕ) : clog b 1 = 0 := clog_of_right_le_one le_rfl _ #align nat.clog_one_right Nat.clog_one_right theorem clog_of_two_le {b n : ℕ} (hb : 1 < b) (hn : 2 ≤ n) : clog b n = clog b ((n + b - 1) / b) + 1 := by rw [clog, dif_pos (⟨hb, hn⟩ : 1 < b ∧ 1 < n)] #align nat.clog_of_two_le Nat.clog_of_two_le theorem clog_pos {b n : ℕ} (hb : 1 < b) (hn : 2 ≤ n) : 0 < clog b n := by rw [clog_of_two_le hb hn] exact zero_lt_succ _ #align nat.clog_pos Nat.clog_pos theorem clog_eq_one {b n : ℕ} (hn : 2 ≤ n) (h : n ≤ b) : clog b n = 1 := by rw [clog_of_two_le (hn.trans h) hn, clog_of_right_le_one] rw [← Nat.lt_succ_iff, Nat.div_lt_iff_lt_mul] <;> omega #align nat.clog_eq_one Nat.clog_eq_one theorem le_pow_iff_clog_le {b : ℕ} (hb : 1 < b) {x y : ℕ} : x ≤ b ^ y ↔ clog b x ≤ y := by induction' x using Nat.strong_induction_on with x ih generalizing y cases y · rw [Nat.pow_zero] refine ⟨fun h => (clog_of_right_le_one h b).le, ?_⟩ simp_rw [← not_lt] contrapose! exact clog_pos hb have b_pos : 0 < b := zero_lt_of_lt hb rw [clog]; split_ifs with h · rw [Nat.add_le_add_iff_right, ← ih ((x + b - 1) / b) (add_pred_div_lt hb h.2), Nat.div_le_iff_le_mul_add_pred b_pos, Nat.mul_comm b, ← Nat.pow_succ, Nat.add_sub_assoc (Nat.succ_le_of_lt b_pos), Nat.add_le_add_iff_right] · exact iff_of_true ((not_lt.1 (not_and.1 h hb)).trans <\| succ_le_of_lt <\| Nat.pow_pos b_pos) (zero_le _) #align nat.le_pow_iff_clog_le Nat.le_pow_iff_clog_le theorem pow_lt_iff_lt_clog {b : ℕ} (hb : 1 < b) {x y : ℕ} : b ^ y < x ↔ y < clog b x := lt_iff_lt_of_le_iff_le (le_pow_iff_clog_le hb) #align nat.pow_lt_iff_lt_clog Nat.pow_lt_iff_lt_clog theorem clog_pow (b x : ℕ) (hb : 1 < b) : clog b (b ^ x) = x := eq_of_forall_ge_iff fun z ↦ by rw [← le_pow_iff_clog_le hb, Nat.pow_le_pow_iff_right hb] #align nat.clog_pow Nat.clog_pow	Mathlib/Data/Nat/Log.lean	315	318	theorem pow_pred_clog_lt_self {b : ℕ} (hb : 1 < b) {x : ℕ} (hx : 1 < x) : b ^ (clog b x).pred < x := by	rw [← not_le, le_pow_iff_clog_le hb, not_le] exact pred_lt (clog_pos hb hx).ne'
import Mathlib.LinearAlgebra.Basis import Mathlib.LinearAlgebra.Multilinear.Basic #align_import linear_algebra.multilinear.basis from "leanprover-community/mathlib"@"ce11c3c2a285bbe6937e26d9792fda4e51f3fe1a" open MultilinearMap variable {R : Type} {ι : Type} {n : ℕ} {M : Fin n → Type} {M₂ : Type} {M₃ : Type} variable [CommSemiring R] [AddCommMonoid M₂] [AddCommMonoid M₃] [∀ i, AddCommMonoid (M i)] variable [∀ i, Module R (M i)] [Module R M₂] [Module R M₃] theorem Basis.ext_multilinear_fin {f g : MultilinearMap R M M₂} {ι₁ : Fin n → Type} (e : ∀ i, Basis (ι₁ i) R (M i)) (h : ∀ v : ∀ i, ι₁ i, (f fun i => e i (v i)) = g fun i => e i (v i)) : f = g := by induction' n with m hm · ext x convert h finZeroElim · apply Function.LeftInverse.injective uncurry_curryLeft refine Basis.ext (e 0) ?_ intro i apply hm (Fin.tail e) intro j convert h (Fin.cons i j) iterate 2 rw [curryLeft_apply] congr 1 with x refine Fin.cases rfl (fun x => ?_) x dsimp [Fin.tail] rw [Fin.cons_succ, Fin.cons_succ] #align basis.ext_multilinear_fin Basis.ext_multilinear_fin	Mathlib/LinearAlgebra/Multilinear/Basis.lean	56	61	theorem Basis.ext_multilinear [Finite ι] {f g : MultilinearMap R (fun _ : ι => M₂) M₃} {ι₁ : Type*} (e : Basis ι₁ R M₂) (h : ∀ v : ι → ι₁, (f fun i => e (v i)) = g fun i => e (v i)) : f = g := by	cases nonempty_fintype ι exact (domDomCongr_eq_iff (Fintype.equivFin ι) f g).mp (Basis.ext_multilinear_fin (fun _ => e) fun i => h (i ∘ _))
import Mathlib.RingTheory.DedekindDomain.Ideal #align_import ring_theory.dedekind_domain.factorization from "leanprover-community/mathlib"@"2f588be38bb5bec02f218ba14f82fc82eb663f87" noncomputable section open scoped Classical nonZeroDivisors open Set Function UniqueFactorizationMonoid IsDedekindDomain IsDedekindDomain.HeightOneSpectrum Classical variable {R : Type} [CommRing R] {K : Type} [Field K] [Algebra R K] [IsFractionRing R K] variable [IsDedekindDomain R] (v : HeightOneSpectrum R) def IsDedekindDomain.HeightOneSpectrum.maxPowDividing (I : Ideal R) : Ideal R := v.asIdeal ^ (Associates.mk v.asIdeal).count (Associates.mk I).factors #align is_dedekind_domain.height_one_spectrum.max_pow_dividing IsDedekindDomain.HeightOneSpectrum.maxPowDividing theorem Ideal.finite_factors {I : Ideal R} (hI : I ≠ 0) : {v : HeightOneSpectrum R \| v.asIdeal ∣ I}.Finite := by rw [← Set.finite_coe_iff, Set.coe_setOf] haveI h_fin := fintypeSubtypeDvd I hI refine Finite.of_injective (fun v => (⟨(v : HeightOneSpectrum R).asIdeal, v.2⟩ : { x // x ∣ I })) ?_ intro v w hvw simp? at hvw says simp only [Subtype.mk.injEq] at hvw exact Subtype.coe_injective ((HeightOneSpectrum.ext_iff (R := R) ↑v ↑w).mpr hvw) #align ideal.finite_factors Ideal.finite_factors	Mathlib/RingTheory/DedekindDomain/Factorization.lean	81	90	theorem Associates.finite_factors {I : Ideal R} (hI : I ≠ 0) : ∀ᶠ v : HeightOneSpectrum R in Filter.cofinite, ((Associates.mk v.asIdeal).count (Associates.mk I).factors : ℤ) = 0 := by	have h_supp : {v : HeightOneSpectrum R \| ¬((Associates.mk v.asIdeal).count (Associates.mk I).factors : ℤ) = 0} = {v : HeightOneSpectrum R \| v.asIdeal ∣ I} := by ext v simp_rw [Int.natCast_eq_zero] exact Associates.count_ne_zero_iff_dvd hI v.irreducible rw [Filter.eventually_cofinite, h_supp] exact Ideal.finite_factors hI
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]	Mathlib/LinearAlgebra/DirectSum/Finsupp.lean	320	323	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]
import Mathlib.Data.Set.Image import Mathlib.Data.SProd #align_import data.set.prod from "leanprover-community/mathlib"@"48fb5b5280e7c81672afc9524185ae994553ebf4" open Function namespace Set section Prod variable {α β γ δ : Type} {s s₁ s₂ : Set α} {t t₁ t₂ : Set β} {a : α} {b : β} theorem Subsingleton.prod (hs : s.Subsingleton) (ht : t.Subsingleton) : (s ×ˢ t).Subsingleton := fun _x hx _y hy ↦ Prod.ext (hs hx.1 hy.1) (ht hx.2 hy.2) noncomputable instance decidableMemProd [DecidablePred (· ∈ s)] [DecidablePred (· ∈ t)] : DecidablePred (· ∈ s ×ˢ t) := fun _ => And.decidable #align set.decidable_mem_prod Set.decidableMemProd @[gcongr] theorem prod_mono (hs : s₁ ⊆ s₂) (ht : t₁ ⊆ t₂) : s₁ ×ˢ t₁ ⊆ s₂ ×ˢ t₂ := fun _ ⟨h₁, h₂⟩ => ⟨hs h₁, ht h₂⟩ #align set.prod_mono Set.prod_mono @[gcongr] theorem prod_mono_left (hs : s₁ ⊆ s₂) : s₁ ×ˢ t ⊆ s₂ ×ˢ t := prod_mono hs Subset.rfl #align set.prod_mono_left Set.prod_mono_left @[gcongr] theorem prod_mono_right (ht : t₁ ⊆ t₂) : s ×ˢ t₁ ⊆ s ×ˢ t₂ := prod_mono Subset.rfl ht #align set.prod_mono_right Set.prod_mono_right @[simp] theorem prod_self_subset_prod_self : s₁ ×ˢ s₁ ⊆ s₂ ×ˢ s₂ ↔ s₁ ⊆ s₂ := ⟨fun h _ hx => (h (mk_mem_prod hx hx)).1, fun h _ hx => ⟨h hx.1, h hx.2⟩⟩ #align set.prod_self_subset_prod_self Set.prod_self_subset_prod_self @[simp] theorem prod_self_ssubset_prod_self : s₁ ×ˢ s₁ ⊂ s₂ ×ˢ s₂ ↔ s₁ ⊂ s₂ := and_congr prod_self_subset_prod_self <\| not_congr prod_self_subset_prod_self #align set.prod_self_ssubset_prod_self Set.prod_self_ssubset_prod_self theorem prod_subset_iff {P : Set (α × β)} : s ×ˢ t ⊆ P ↔ ∀ x ∈ s, ∀ y ∈ t, (x, y) ∈ P := ⟨fun h _ hx _ hy => h (mk_mem_prod hx hy), fun h ⟨_, _⟩ hp => h _ hp.1 _ hp.2⟩ #align set.prod_subset_iff Set.prod_subset_iff theorem forall_prod_set {p : α × β → Prop} : (∀ x ∈ s ×ˢ t, p x) ↔ ∀ x ∈ s, ∀ y ∈ t, p (x, y) := prod_subset_iff #align set.forall_prod_set Set.forall_prod_set theorem exists_prod_set {p : α × β → Prop} : (∃ x ∈ s ×ˢ t, p x) ↔ ∃ x ∈ s, ∃ y ∈ t, p (x, y) := by simp [and_assoc] #align set.exists_prod_set Set.exists_prod_set @[simp] theorem prod_empty : s ×ˢ (∅ : Set β) = ∅ := by ext exact and_false_iff _ #align set.prod_empty Set.prod_empty @[simp] theorem empty_prod : (∅ : Set α) ×ˢ t = ∅ := by ext exact false_and_iff _ #align set.empty_prod Set.empty_prod @[simp, mfld_simps] theorem univ_prod_univ : @univ α ×ˢ @univ β = univ := by ext exact true_and_iff _ #align set.univ_prod_univ Set.univ_prod_univ theorem univ_prod {t : Set β} : (univ : Set α) ×ˢ t = Prod.snd ⁻¹' t := by simp [prod_eq] #align set.univ_prod Set.univ_prod theorem prod_univ {s : Set α} : s ×ˢ (univ : Set β) = Prod.fst ⁻¹' s := by simp [prod_eq] #align set.prod_univ Set.prod_univ @[simp] lemma prod_eq_univ [Nonempty α] [Nonempty β] : s ×ˢ t = univ ↔ s = univ ∧ t = univ := by simp [eq_univ_iff_forall, forall_and] @[simp] theorem singleton_prod : ({a} : Set α) ×ˢ t = Prod.mk a '' t := by ext ⟨x, y⟩ simp [and_left_comm, eq_comm] #align set.singleton_prod Set.singleton_prod @[simp] theorem prod_singleton : s ×ˢ ({b} : Set β) = (fun a => (a, b)) '' s := by ext ⟨x, y⟩ simp [and_left_comm, eq_comm] #align set.prod_singleton Set.prod_singleton theorem singleton_prod_singleton : ({a} : Set α) ×ˢ ({b} : Set β) = {(a, b)} := by simp #align set.singleton_prod_singleton Set.singleton_prod_singleton @[simp] theorem union_prod : (s₁ ∪ s₂) ×ˢ t = s₁ ×ˢ t ∪ s₂ ×ˢ t := by ext ⟨x, y⟩ simp [or_and_right] #align set.union_prod Set.union_prod @[simp] theorem prod_union : s ×ˢ (t₁ ∪ t₂) = s ×ˢ t₁ ∪ s ×ˢ t₂ := by ext ⟨x, y⟩ simp [and_or_left] #align set.prod_union Set.prod_union theorem inter_prod : (s₁ ∩ s₂) ×ˢ t = s₁ ×ˢ t ∩ s₂ ×ˢ t := by ext ⟨x, y⟩ simp only [← and_and_right, mem_inter_iff, mem_prod] #align set.inter_prod Set.inter_prod theorem prod_inter : s ×ˢ (t₁ ∩ t₂) = s ×ˢ t₁ ∩ s ×ˢ t₂ := by ext ⟨x, y⟩ simp only [← and_and_left, mem_inter_iff, mem_prod] #align set.prod_inter Set.prod_inter @[mfld_simps] theorem prod_inter_prod : s₁ ×ˢ t₁ ∩ s₂ ×ˢ t₂ = (s₁ ∩ s₂) ×ˢ (t₁ ∩ t₂) := by ext ⟨x, y⟩ simp [and_assoc, and_left_comm] #align set.prod_inter_prod Set.prod_inter_prod lemma compl_prod_eq_union {α β : Type} (s : Set α) (t : Set β) : (s ×ˢ t)ᶜ = (sᶜ ×ˢ univ) ∪ (univ ×ˢ tᶜ) := by ext p simp only [mem_compl_iff, mem_prod, not_and, mem_union, mem_univ, and_true, true_and] constructor <;> intro h · by_cases fst_in_s : p.fst ∈ s · exact Or.inr (h fst_in_s) · exact Or.inl fst_in_s · intro fst_in_s simpa only [fst_in_s, not_true, false_or] using h @[simp] theorem disjoint_prod : Disjoint (s₁ ×ˢ t₁) (s₂ ×ˢ t₂) ↔ Disjoint s₁ s₂ ∨ Disjoint t₁ t₂ := by simp_rw [disjoint_left, mem_prod, not_and_or, Prod.forall, and_imp, ← @forall_or_right α, ← @forall_or_left β, ← @forall_or_right (_ ∈ s₁), ← @forall_or_left (_ ∈ t₁)] #align set.disjoint_prod Set.disjoint_prod theorem Disjoint.set_prod_left (hs : Disjoint s₁ s₂) (t₁ t₂ : Set β) : Disjoint (s₁ ×ˢ t₁) (s₂ ×ˢ t₂) := disjoint_left.2 fun ⟨_a, _b⟩ ⟨ha₁, _⟩ ⟨ha₂, _⟩ => disjoint_left.1 hs ha₁ ha₂ #align set.disjoint.set_prod_left Set.Disjoint.set_prod_left theorem Disjoint.set_prod_right (ht : Disjoint t₁ t₂) (s₁ s₂ : Set α) : Disjoint (s₁ ×ˢ t₁) (s₂ ×ˢ t₂) := disjoint_left.2 fun ⟨_a, _b⟩ ⟨_, hb₁⟩ ⟨_, hb₂⟩ => disjoint_left.1 ht hb₁ hb₂ #align set.disjoint.set_prod_right Set.Disjoint.set_prod_right theorem insert_prod : insert a s ×ˢ t = Prod.mk a '' t ∪ s ×ˢ t := by ext ⟨x, y⟩ simp (config := { contextual := true }) [image, iff_def, or_imp] #align set.insert_prod Set.insert_prod theorem prod_insert : s ×ˢ insert b t = (fun a => (a, b)) '' s ∪ s ×ˢ t := by ext ⟨x, y⟩ -- porting note (#10745): -- was `simp (config := { contextual := true }) [image, iff_def, or_imp, Imp.swap]` simp only [mem_prod, mem_insert_iff, image, mem_union, mem_setOf_eq, Prod.mk.injEq] refine ⟨fun h => ?_, fun h => ?_⟩ · obtain ⟨hx, rfl\|hy⟩ := h · exact Or.inl ⟨x, hx, rfl, rfl⟩ · exact Or.inr ⟨hx, hy⟩ · obtain ⟨x, hx, rfl, rfl⟩\|⟨hx, hy⟩ := h · exact ⟨hx, Or.inl rfl⟩ · exact ⟨hx, Or.inr hy⟩ #align set.prod_insert Set.prod_insert theorem prod_preimage_eq {f : γ → α} {g : δ → β} : (f ⁻¹' s) ×ˢ (g ⁻¹' t) = (fun p : γ × δ => (f p.1, g p.2)) ⁻¹' s ×ˢ t := rfl #align set.prod_preimage_eq Set.prod_preimage_eq theorem prod_preimage_left {f : γ → α} : (f ⁻¹' s) ×ˢ t = (fun p : γ × β => (f p.1, p.2)) ⁻¹' s ×ˢ t := rfl #align set.prod_preimage_left Set.prod_preimage_left theorem prod_preimage_right {g : δ → β} : s ×ˢ (g ⁻¹' t) = (fun p : α × δ => (p.1, g p.2)) ⁻¹' s ×ˢ t := rfl #align set.prod_preimage_right Set.prod_preimage_right theorem preimage_prod_map_prod (f : α → β) (g : γ → δ) (s : Set β) (t : Set δ) : Prod.map f g ⁻¹' s ×ˢ t = (f ⁻¹' s) ×ˢ (g ⁻¹' t) := rfl #align set.preimage_prod_map_prod Set.preimage_prod_map_prod theorem mk_preimage_prod (f : γ → α) (g : γ → β) : (fun x => (f x, g x)) ⁻¹' s ×ˢ t = f ⁻¹' s ∩ g ⁻¹' t := rfl #align set.mk_preimage_prod Set.mk_preimage_prod @[simp] theorem mk_preimage_prod_left (hb : b ∈ t) : (fun a => (a, b)) ⁻¹' s ×ˢ t = s := by ext a simp [hb] #align set.mk_preimage_prod_left Set.mk_preimage_prod_left @[simp] theorem mk_preimage_prod_right (ha : a ∈ s) : Prod.mk a ⁻¹' s ×ˢ t = t := by ext b simp [ha] #align set.mk_preimage_prod_right Set.mk_preimage_prod_right @[simp] theorem mk_preimage_prod_left_eq_empty (hb : b ∉ t) : (fun a => (a, b)) ⁻¹' s ×ˢ t = ∅ := by ext a simp [hb] #align set.mk_preimage_prod_left_eq_empty Set.mk_preimage_prod_left_eq_empty @[simp]	Mathlib/Data/Set/Prod.lean	243	245	theorem mk_preimage_prod_right_eq_empty (ha : a ∉ s) : Prod.mk a ⁻¹' s ×ˢ t = ∅ := by	ext b simp [ha]
import Mathlib.Order.Filter.Basic #align_import order.filter.prod from "leanprover-community/mathlib"@"d6fad0e5bf2d6f48da9175d25c3dc5706b3834ce" open Set open Filter namespace Filter variable {α β γ δ : Type} {ι : Sort} section Prod variable {s : Set α} {t : Set β} {f : Filter α} {g : Filter β} protected def prod (f : Filter α) (g : Filter β) : Filter (α × β) := f.comap Prod.fst ⊓ g.comap Prod.snd #align filter.prod Filter.prod instance instSProd : SProd (Filter α) (Filter β) (Filter (α × β)) where sprod := Filter.prod theorem prod_mem_prod (hs : s ∈ f) (ht : t ∈ g) : s ×ˢ t ∈ f ×ˢ g := inter_mem_inf (preimage_mem_comap hs) (preimage_mem_comap ht) #align filter.prod_mem_prod Filter.prod_mem_prod theorem mem_prod_iff {s : Set (α × β)} {f : Filter α} {g : Filter β} : s ∈ f ×ˢ g ↔ ∃ t₁ ∈ f, ∃ t₂ ∈ g, t₁ ×ˢ t₂ ⊆ s := by simp only [SProd.sprod, Filter.prod] constructor · rintro ⟨t₁, ⟨s₁, hs₁, hts₁⟩, t₂, ⟨s₂, hs₂, hts₂⟩, rfl⟩ exact ⟨s₁, hs₁, s₂, hs₂, fun p ⟨h, h'⟩ => ⟨hts₁ h, hts₂ h'⟩⟩ · rintro ⟨t₁, ht₁, t₂, ht₂, h⟩ exact mem_inf_of_inter (preimage_mem_comap ht₁) (preimage_mem_comap ht₂) h #align filter.mem_prod_iff Filter.mem_prod_iff @[simp] theorem prod_mem_prod_iff [f.NeBot] [g.NeBot] : s ×ˢ t ∈ f ×ˢ g ↔ s ∈ f ∧ t ∈ g := ⟨fun h => let ⟨_s', hs', _t', ht', H⟩ := mem_prod_iff.1 h (prod_subset_prod_iff.1 H).elim (fun ⟨hs's, ht't⟩ => ⟨mem_of_superset hs' hs's, mem_of_superset ht' ht't⟩) fun h => h.elim (fun hs'e => absurd hs'e (nonempty_of_mem hs').ne_empty) fun ht'e => absurd ht'e (nonempty_of_mem ht').ne_empty, fun h => prod_mem_prod h.1 h.2⟩ #align filter.prod_mem_prod_iff Filter.prod_mem_prod_iff theorem mem_prod_principal {s : Set (α × β)} : s ∈ f ×ˢ 𝓟 t ↔ { a \| ∀ b ∈ t, (a, b) ∈ s } ∈ f := by rw [← @exists_mem_subset_iff _ f, mem_prod_iff] refine exists_congr fun u => Iff.rfl.and ⟨?_, fun h => ⟨t, mem_principal_self t, ?_⟩⟩ · rintro ⟨v, v_in, hv⟩ a a_in b b_in exact hv (mk_mem_prod a_in <\| v_in b_in) · rintro ⟨x, y⟩ ⟨hx, hy⟩ exact h hx y hy #align filter.mem_prod_principal Filter.mem_prod_principal theorem mem_prod_top {s : Set (α × β)} : s ∈ f ×ˢ (⊤ : Filter β) ↔ { a \| ∀ b, (a, b) ∈ s } ∈ f := by rw [← principal_univ, mem_prod_principal] simp only [mem_univ, forall_true_left] #align filter.mem_prod_top Filter.mem_prod_top theorem eventually_prod_principal_iff {p : α × β → Prop} {s : Set β} : (∀ᶠ x : α × β in f ×ˢ 𝓟 s, p x) ↔ ∀ᶠ x : α in f, ∀ y : β, y ∈ s → p (x, y) := by rw [eventually_iff, eventually_iff, mem_prod_principal] simp only [mem_setOf_eq] #align filter.eventually_prod_principal_iff Filter.eventually_prod_principal_iff theorem comap_prod (f : α → β × γ) (b : Filter β) (c : Filter γ) : comap f (b ×ˢ c) = comap (Prod.fst ∘ f) b ⊓ comap (Prod.snd ∘ f) c := by erw [comap_inf, Filter.comap_comap, Filter.comap_comap] #align filter.comap_prod Filter.comap_prod theorem prod_top : f ×ˢ (⊤ : Filter β) = f.comap Prod.fst := by dsimp only [SProd.sprod] rw [Filter.prod, comap_top, inf_top_eq] #align filter.prod_top Filter.prod_top theorem top_prod : (⊤ : Filter α) ×ˢ g = g.comap Prod.snd := by dsimp only [SProd.sprod] rw [Filter.prod, comap_top, top_inf_eq]	Mathlib/Order/Filter/Prod.lean	121	123	theorem sup_prod (f₁ f₂ : Filter α) (g : Filter β) : (f₁ ⊔ f₂) ×ˢ g = (f₁ ×ˢ g) ⊔ (f₂ ×ˢ g) := by	dsimp only [SProd.sprod] rw [Filter.prod, comap_sup, inf_sup_right, ← Filter.prod, ← Filter.prod]
import Mathlib.Topology.MetricSpace.PseudoMetric #align_import topology.metric_space.basic from "leanprover-community/mathlib"@"c8f305514e0d47dfaa710f5a52f0d21b588e6328" open Set Filter Bornology open scoped NNReal Uniformity universe u v w variable {α : Type u} {β : Type v} {X ι : Type} variable [PseudoMetricSpace α] class MetricSpace (α : Type u) extends PseudoMetricSpace α : Type u where eq_of_dist_eq_zero : ∀ {x y : α}, dist x y = 0 → x = y #align metric_space MetricSpace @[ext] theorem MetricSpace.ext {α : Type} {m m' : MetricSpace α} (h : m.toDist = m'.toDist) : m = m' := by cases m; cases m'; congr; ext1; assumption #align metric_space.ext MetricSpace.ext def MetricSpace.ofDistTopology {α : Type u} [TopologicalSpace α] (dist : α → α → ℝ) (dist_self : ∀ x : α, dist x x = 0) (dist_comm : ∀ x y : α, dist x y = dist y x) (dist_triangle : ∀ x y z : α, dist x z ≤ dist x y + dist y z) (H : ∀ s : Set α, IsOpen s ↔ ∀ x ∈ s, ∃ ε > 0, ∀ y, dist x y < ε → y ∈ s) (eq_of_dist_eq_zero : ∀ x y : α, dist x y = 0 → x = y) : MetricSpace α := { PseudoMetricSpace.ofDistTopology dist dist_self dist_comm dist_triangle H with eq_of_dist_eq_zero := eq_of_dist_eq_zero _ _ } #align metric_space.of_dist_topology MetricSpace.ofDistTopology variable {γ : Type w} [MetricSpace γ] theorem eq_of_dist_eq_zero {x y : γ} : dist x y = 0 → x = y := MetricSpace.eq_of_dist_eq_zero #align eq_of_dist_eq_zero eq_of_dist_eq_zero @[simp] theorem dist_eq_zero {x y : γ} : dist x y = 0 ↔ x = y := Iff.intro eq_of_dist_eq_zero fun this => this ▸ dist_self _ #align dist_eq_zero dist_eq_zero @[simp] theorem zero_eq_dist {x y : γ} : 0 = dist x y ↔ x = y := by rw [eq_comm, dist_eq_zero] #align zero_eq_dist zero_eq_dist theorem dist_ne_zero {x y : γ} : dist x y ≠ 0 ↔ x ≠ y := by simpa only [not_iff_not] using dist_eq_zero #align dist_ne_zero dist_ne_zero @[simp] theorem dist_le_zero {x y : γ} : dist x y ≤ 0 ↔ x = y := by simpa [le_antisymm_iff, dist_nonneg] using @dist_eq_zero _ _ x y #align dist_le_zero dist_le_zero @[simp] theorem dist_pos {x y : γ} : 0 < dist x y ↔ x ≠ y := by simpa only [not_le] using not_congr dist_le_zero #align dist_pos dist_pos theorem eq_of_forall_dist_le {x y : γ} (h : ∀ ε > 0, dist x y ≤ ε) : x = y := eq_of_dist_eq_zero (eq_of_le_of_forall_le_of_dense dist_nonneg h) #align eq_of_forall_dist_le eq_of_forall_dist_le theorem eq_of_nndist_eq_zero {x y : γ} : nndist x y = 0 → x = y := by simp only [← NNReal.eq_iff, ← dist_nndist, imp_self, NNReal.coe_zero, dist_eq_zero] #align eq_of_nndist_eq_zero eq_of_nndist_eq_zero @[simp] theorem nndist_eq_zero {x y : γ} : nndist x y = 0 ↔ x = y := by simp only [← NNReal.eq_iff, ← dist_nndist, imp_self, NNReal.coe_zero, dist_eq_zero] #align nndist_eq_zero nndist_eq_zero @[simp] theorem zero_eq_nndist {x y : γ} : 0 = nndist x y ↔ x = y := by simp only [← NNReal.eq_iff, ← dist_nndist, imp_self, NNReal.coe_zero, zero_eq_dist] #align zero_eq_nndist zero_eq_nndist namespace Metric variable {x : γ} {s : Set γ} @[simp] theorem closedBall_zero : closedBall x 0 = {x} := Set.ext fun _ => dist_le_zero #align metric.closed_ball_zero Metric.closedBall_zero @[simp] theorem sphere_zero : sphere x 0 = {x} := Set.ext fun _ => dist_eq_zero #align metric.sphere_zero Metric.sphere_zero theorem subsingleton_closedBall (x : γ) {r : ℝ} (hr : r ≤ 0) : (closedBall x r).Subsingleton := by rcases hr.lt_or_eq with (hr \| rfl) · rw [closedBall_eq_empty.2 hr] exact subsingleton_empty · rw [closedBall_zero] exact subsingleton_singleton #align metric.subsingleton_closed_ball Metric.subsingleton_closedBall theorem subsingleton_sphere (x : γ) {r : ℝ} (hr : r ≤ 0) : (sphere x r).Subsingleton := (subsingleton_closedBall x hr).anti sphere_subset_closedBall #align metric.subsingleton_sphere Metric.subsingleton_sphere -- see Note [lower instance priority] instance (priority := 100) _root_.MetricSpace.instT0Space : T0Space γ where t0 _ _ h := eq_of_dist_eq_zero <\| Metric.inseparable_iff.1 h #align metric_space.to_separated MetricSpace.instT0Space	Mathlib/Topology/MetricSpace/Basic.lean	140	144	theorem uniformEmbedding_iff' [MetricSpace β] {f : γ → β} : UniformEmbedding f ↔ (∀ ε > 0, ∃ δ > 0, ∀ {a b : γ}, dist a b < δ → dist (f a) (f b) < ε) ∧ ∀ δ > 0, ∃ ε > 0, ∀ {a b : γ}, dist (f a) (f b) < ε → dist a b < δ := by	rw [uniformEmbedding_iff_uniformInducing, uniformInducing_iff, uniformContinuous_iff]
import Mathlib.LinearAlgebra.Dual open Function Module variable (R M N : Type*) [CommRing R] [AddCommGroup M] [Module R M] [AddCommGroup N] [Module R N] structure PerfectPairing := toLin : M →ₗ[R] N →ₗ[R] R bijectiveLeft : Bijective toLin bijectiveRight : Bijective toLin.flip attribute [nolint docBlame] PerfectPairing.toLin variable {R M N} namespace PerfectPairing instance instFunLike : FunLike (PerfectPairing R M N) M (N →ₗ[R] R) where coe f := f.toLin coe_injective' x y h := by cases x; cases y; simpa using h variable (p : PerfectPairing R M N) protected def flip : PerfectPairing R N M where toLin := p.toLin.flip bijectiveLeft := p.bijectiveRight bijectiveRight := p.bijectiveLeft @[simp] lemma flip_flip : p.flip.flip = p := rfl noncomputable def toDualLeft : M ≃ₗ[R] Dual R N := LinearEquiv.ofBijective p.toLin p.bijectiveLeft @[simp] theorem toDualLeft_apply (a : M) : p.toDualLeft a = p a := rfl @[simp] theorem apply_toDualLeft_symm_apply (f : Dual R N) (x : N) : p (p.toDualLeft.symm f) x = f x := by have h := LinearEquiv.apply_symm_apply p.toDualLeft f rw [toDualLeft_apply] at h exact congrFun (congrArg DFunLike.coe h) x noncomputable def toDualRight : N ≃ₗ[R] Dual R M := toDualLeft p.flip @[simp] theorem toDualRight_apply (a : N) : p.toDualRight a = p.flip a := rfl @[simp] theorem apply_apply_toDualRight_symm (x : M) (f : Dual R M) : (p x) (p.toDualRight.symm f) = f x := by have h := LinearEquiv.apply_symm_apply p.toDualRight f rw [toDualRight_apply] at h exact congrFun (congrArg DFunLike.coe h) x theorem toDualLeft_of_toDualRight_symm (x : M) (f : Dual R M) : (p.toDualLeft x) (p.toDualRight.symm f) = f x := by rw [@toDualLeft_apply] exact apply_apply_toDualRight_symm p x f theorem toDualRight_symm_toDualLeft (x : M) : p.toDualRight.symm.dualMap (p.toDualLeft x) = Dual.eval R M x := by ext f simp only [LinearEquiv.dualMap_apply, Dual.eval_apply] exact toDualLeft_of_toDualRight_symm p x f theorem toDualRight_symm_comp_toDualLeft : p.toDualRight.symm.dualMap ∘ₗ (p.toDualLeft : M →ₗ[R] Dual R N) = Dual.eval R M := by ext1 x exact p.toDualRight_symm_toDualLeft x theorem bijective_toDualRight_symm_toDualLeft : Bijective (fun x => p.toDualRight.symm.dualMap (p.toDualLeft x)) := Bijective.comp (LinearEquiv.bijective p.toDualRight.symm.dualMap) (LinearEquiv.bijective p.toDualLeft)	Mathlib/LinearAlgebra/PerfectPairing.lean	112	115	theorem reflexive_left : IsReflexive R M where bijective_dual_eval' := by	rw [← p.toDualRight_symm_comp_toDualLeft] exact p.bijective_toDualRight_symm_toDualLeft
import Mathlib.Analysis.Asymptotics.AsymptoticEquivalent import Mathlib.Analysis.Calculus.FDeriv.Linear import Mathlib.Analysis.Calculus.FDeriv.Comp #align_import analysis.calculus.fderiv.equiv from "leanprover-community/mathlib"@"e3fb84046afd187b710170887195d50bada934ee" open Filter Asymptotics ContinuousLinearMap Set Metric open scoped Classical open Topology NNReal Filter Asymptotics ENNReal noncomputable section section variable {𝕜 : Type} [NontriviallyNormedField 𝕜] variable {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] variable {F : Type} [NormedAddCommGroup F] [NormedSpace 𝕜 F] variable {G : Type} [NormedAddCommGroup G] [NormedSpace 𝕜 G] variable {G' : Type*} [NormedAddCommGroup G'] [NormedSpace 𝕜 G'] variable {f f₀ f₁ g : E → F} variable {f' f₀' f₁' g' : E →L[𝕜] F} variable (e : E →L[𝕜] F) variable {x : E} variable {s t : Set E} variable {L L₁ L₂ : Filter E} theorem HasStrictFDerivAt.of_local_left_inverse {f : E → F} {f' : E ≃L[𝕜] F} {g : F → E} {a : F} (hg : ContinuousAt g a) (hf : HasStrictFDerivAt f (f' : E →L[𝕜] F) (g a)) (hfg : ∀ᶠ y in 𝓝 a, f (g y) = y) : HasStrictFDerivAt g (f'.symm : F →L[𝕜] E) a := by replace hg := hg.prod_map' hg replace hfg := hfg.prod_mk_nhds hfg have : (fun p : F × F => g p.1 - g p.2 - f'.symm (p.1 - p.2)) =O[𝓝 (a, a)] fun p : F × F => f' (g p.1 - g p.2) - (p.1 - p.2) := by refine ((f'.symm : F →L[𝕜] E).isBigO_comp _ _).congr (fun x => ?_) fun _ => rfl simp refine this.trans_isLittleO ?_ clear this refine ((hf.comp_tendsto hg).symm.congr' (hfg.mono ?_) (eventually_of_forall fun _ => rfl)).trans_isBigO ?_ · rintro p ⟨hp1, hp2⟩ simp [hp1, hp2] · refine (hf.isBigO_sub_rev.comp_tendsto hg).congr' (eventually_of_forall fun _ => rfl) (hfg.mono ?_) rintro p ⟨hp1, hp2⟩ simp only [(· ∘ ·), hp1, hp2] #align has_strict_fderiv_at.of_local_left_inverse HasStrictFDerivAt.of_local_left_inverse theorem HasFDerivAt.of_local_left_inverse {f : E → F} {f' : E ≃L[𝕜] F} {g : F → E} {a : F} (hg : ContinuousAt g a) (hf : HasFDerivAt f (f' : E →L[𝕜] F) (g a)) (hfg : ∀ᶠ y in 𝓝 a, f (g y) = y) : HasFDerivAt g (f'.symm : F →L[𝕜] E) a := by have : (fun x : F => g x - g a - f'.symm (x - a)) =O[𝓝 a] fun x : F => f' (g x - g a) - (x - a) := by refine ((f'.symm : F →L[𝕜] E).isBigO_comp _ _).congr (fun x => ?_) fun _ => rfl simp refine HasFDerivAtFilter.of_isLittleO <\| this.trans_isLittleO ?_ clear this refine ((hf.isLittleO.comp_tendsto hg).symm.congr' (hfg.mono ?_) .rfl).trans_isBigO ?_ · intro p hp simp [hp, hfg.self_of_nhds] · refine ((hf.isBigO_sub_rev f'.antilipschitz).comp_tendsto hg).congr' (eventually_of_forall fun _ => rfl) (hfg.mono ?_) rintro p hp simp only [(· ∘ ·), hp, hfg.self_of_nhds] #align has_fderiv_at.of_local_left_inverse HasFDerivAt.of_local_left_inverse theorem PartialHomeomorph.hasStrictFDerivAt_symm (f : PartialHomeomorph E F) {f' : E ≃L[𝕜] F} {a : F} (ha : a ∈ f.target) (htff' : HasStrictFDerivAt f (f' : E →L[𝕜] F) (f.symm a)) : HasStrictFDerivAt f.symm (f'.symm : F →L[𝕜] E) a := htff'.of_local_left_inverse (f.symm.continuousAt ha) (f.eventually_right_inverse ha) #align local_homeomorph.has_strict_fderiv_at_symm PartialHomeomorph.hasStrictFDerivAt_symm theorem PartialHomeomorph.hasFDerivAt_symm (f : PartialHomeomorph E F) {f' : E ≃L[𝕜] F} {a : F} (ha : a ∈ f.target) (htff' : HasFDerivAt f (f' : E →L[𝕜] F) (f.symm a)) : HasFDerivAt f.symm (f'.symm : F →L[𝕜] E) a := htff'.of_local_left_inverse (f.symm.continuousAt ha) (f.eventually_right_inverse ha) #align local_homeomorph.has_fderiv_at_symm PartialHomeomorph.hasFDerivAt_symm	Mathlib/Analysis/Calculus/FDeriv/Equiv.lean	459	465	theorem HasFDerivWithinAt.eventually_ne (h : HasFDerivWithinAt f f' s x) (hf' : ∃ C, ∀ z, ‖z‖ ≤ C * ‖f' z‖) : ∀ᶠ z in 𝓝[s \ {x}] x, f z ≠ f x := by	rw [nhdsWithin, diff_eq, ← inf_principal, ← inf_assoc, eventually_inf_principal] have A : (fun z => z - x) =O[𝓝[s] x] fun z => f' (z - x) := isBigO_iff.2 <\| hf'.imp fun C hC => eventually_of_forall fun z => hC _ have : (fun z => f z - f x) ~[𝓝[s] x] fun z => f' (z - x) := h.isLittleO.trans_isBigO A simpa [not_imp_not, sub_eq_zero] using (A.trans this.isBigO_symm).eq_zero_imp
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 theorem getLast_congr {l₁ l₂ : List α} (h₁ : l₁ ≠ []) (h₂ : l₂ ≠ []) (h₃ : l₁ = l₂) : getLast l₁ h₁ = getLast l₂ h₂ := by subst l₁; rfl #align list.last_congr List.getLast_congr #align list.last_mem List.getLast_mem theorem getLast_replicate_succ (m : ℕ) (a : α) : (replicate (m + 1) a).getLast (ne_nil_of_length_eq_succ (length_replicate _ _)) = a := by simp only [replicate_succ'] exact getLast_append_singleton _ #align list.last_replicate_succ List.getLast_replicate_succ -- Porting note: Moved earlier in file, for use in subsequent lemmas. @[simp] theorem getLast?_cons_cons (a b : α) (l : List α) : getLast? (a :: b :: l) = getLast? (b :: l) := rfl @[simp] theorem getLast?_isNone : ∀ {l : List α}, (getLast? l).isNone ↔ l = [] \| [] => by simp \| [a] => by simp \| a :: b :: l => by simp [@getLast?_isNone (b :: l)] #align list.last'_is_none List.getLast?_isNone @[simp] theorem getLast?_isSome : ∀ {l : List α}, l.getLast?.isSome ↔ l ≠ [] \| [] => by simp \| [a] => by simp \| a :: b :: l => by simp [@getLast?_isSome (b :: l)] #align list.last'_is_some List.getLast?_isSome theorem mem_getLast?_eq_getLast : ∀ {l : List α} {x : α}, x ∈ l.getLast? → ∃ h, x = getLast l h \| [], x, hx => False.elim <\| by simp at hx \| [a], x, hx => have : a = x := by simpa using hx this ▸ ⟨cons_ne_nil a [], rfl⟩ \| a :: b :: l, x, hx => by rw [getLast?_cons_cons] at hx rcases mem_getLast?_eq_getLast hx with ⟨_, h₂⟩ use cons_ne_nil _ _ assumption #align list.mem_last'_eq_last List.mem_getLast?_eq_getLast theorem getLast?_eq_getLast_of_ne_nil : ∀ {l : List α} (h : l ≠ []), l.getLast? = some (l.getLast h) \| [], h => (h rfl).elim \| [_], _ => rfl \| _ :: b :: l, _ => @getLast?_eq_getLast_of_ne_nil (b :: l) (cons_ne_nil _ _) #align list.last'_eq_last_of_ne_nil List.getLast?_eq_getLast_of_ne_nil theorem mem_getLast?_cons {x y : α} : ∀ {l : List α}, x ∈ l.getLast? → x ∈ (y :: l).getLast? \| [], _ => by contradiction \| _ :: _, h => h #align list.mem_last'_cons List.mem_getLast?_cons theorem mem_of_mem_getLast? {l : List α} {a : α} (ha : a ∈ l.getLast?) : a ∈ l := let ⟨_, h₂⟩ := mem_getLast?_eq_getLast ha h₂.symm ▸ getLast_mem _ #align list.mem_of_mem_last' List.mem_of_mem_getLast? theorem dropLast_append_getLast? : ∀ {l : List α}, ∀ a ∈ l.getLast?, dropLast l ++ [a] = l \| [], a, ha => (Option.not_mem_none a ha).elim \| [a], _, rfl => rfl \| a :: b :: l, c, hc => by rw [getLast?_cons_cons] at hc rw [dropLast_cons₂, cons_append, dropLast_append_getLast? _ hc] #align list.init_append_last' List.dropLast_append_getLast? theorem getLastI_eq_getLast? [Inhabited α] : ∀ l : List α, l.getLastI = l.getLast?.iget \| [] => by simp [getLastI, Inhabited.default] \| [a] => rfl \| [a, b] => rfl \| [a, b, c] => rfl \| _ :: _ :: c :: l => by simp [getLastI, getLastI_eq_getLast? (c :: l)] #align list.ilast_eq_last' List.getLastI_eq_getLast? @[simp] theorem getLast?_append_cons : ∀ (l₁ : List α) (a : α) (l₂ : List α), getLast? (l₁ ++ a :: l₂) = getLast? (a :: l₂) \| [], a, l₂ => rfl \| [b], a, l₂ => rfl \| b :: c :: l₁, a, l₂ => by rw [cons_append, cons_append, getLast?_cons_cons, ← cons_append, getLast?_append_cons (c :: l₁)] #align list.last'_append_cons List.getLast?_append_cons #align list.last'_cons_cons List.getLast?_cons_cons theorem getLast?_append_of_ne_nil (l₁ : List α) : ∀ {l₂ : List α} (_ : l₂ ≠ []), getLast? (l₁ ++ l₂) = getLast? l₂ \| [], hl₂ => by contradiction \| b :: l₂, _ => getLast?_append_cons l₁ b l₂ #align list.last'_append_of_ne_nil List.getLast?_append_of_ne_nil theorem getLast?_append {l₁ l₂ : List α} {x : α} (h : x ∈ l₂.getLast?) : x ∈ (l₁ ++ l₂).getLast? := by cases l₂ · contradiction · rw [List.getLast?_append_cons] exact h #align list.last'_append List.getLast?_append @[simp] theorem head!_nil [Inhabited α] : ([] : List α).head! = default := rfl @[simp] theorem head_cons_tail (x : List α) (h : x ≠ []) : x.head h :: x.tail = x := by cases x <;> simp at h ⊢ theorem head!_eq_head? [Inhabited α] (l : List α) : head! l = (head? l).iget := by cases l <;> rfl #align list.head_eq_head' List.head!_eq_head? theorem surjective_head! [Inhabited α] : Surjective (@head! α _) := fun x => ⟨[x], rfl⟩ #align list.surjective_head List.surjective_head! theorem surjective_head? : Surjective (@head? α) := Option.forall.2 ⟨⟨[], rfl⟩, fun x => ⟨[x], rfl⟩⟩ #align list.surjective_head' List.surjective_head? theorem surjective_tail : Surjective (@tail α) \| [] => ⟨[], rfl⟩ \| a :: l => ⟨a :: a :: l, rfl⟩ #align list.surjective_tail List.surjective_tail theorem eq_cons_of_mem_head? {x : α} : ∀ {l : List α}, x ∈ l.head? → l = x :: tail l \| [], h => (Option.not_mem_none _ h).elim \| a :: l, h => by simp only [head?, Option.mem_def, Option.some_inj] at h exact h ▸ rfl #align list.eq_cons_of_mem_head' List.eq_cons_of_mem_head? theorem mem_of_mem_head? {x : α} {l : List α} (h : x ∈ l.head?) : x ∈ l := (eq_cons_of_mem_head? h).symm ▸ mem_cons_self _ _ #align list.mem_of_mem_head' List.mem_of_mem_head? @[simp] theorem head!_cons [Inhabited α] (a : α) (l : List α) : head! (a :: l) = a := rfl #align list.head_cons List.head!_cons #align list.tail_nil List.tail_nil #align list.tail_cons List.tail_cons @[simp] theorem head!_append [Inhabited α] (t : List α) {s : List α} (h : s ≠ []) : head! (s ++ t) = head! s := by induction s · contradiction · rfl #align list.head_append List.head!_append	Mathlib/Data/List/Basic.lean	812	815	theorem head?_append {s t : List α} {x : α} (h : x ∈ s.head?) : x ∈ (s ++ t).head? := by	cases s · contradiction · exact h
import Mathlib.Order.Interval.Set.Monotone import Mathlib.Topology.MetricSpace.Basic import Mathlib.Topology.MetricSpace.Bounded import Mathlib.Topology.Order.MonotoneConvergence #align_import analysis.box_integral.box.basic from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" open Set Function Metric Filter noncomputable section open scoped Classical open NNReal Topology namespace BoxIntegral variable {ι : Type} structure Box (ι : Type) where (lower upper : ι → ℝ) lower_lt_upper : ∀ i, lower i < upper i #align box_integral.box BoxIntegral.Box attribute [simp] Box.lower_lt_upper namespace Box variable (I J : Box ι) {x y : ι → ℝ} instance : Inhabited (Box ι) := ⟨⟨0, 1, fun _ ↦ zero_lt_one⟩⟩ theorem lower_le_upper : I.lower ≤ I.upper := fun i ↦ (I.lower_lt_upper i).le #align box_integral.box.lower_le_upper BoxIntegral.Box.lower_le_upper theorem lower_ne_upper (i) : I.lower i ≠ I.upper i := (I.lower_lt_upper i).ne #align box_integral.box.lower_ne_upper BoxIntegral.Box.lower_ne_upper instance : Membership (ι → ℝ) (Box ι) := ⟨fun x I ↦ ∀ i, x i ∈ Ioc (I.lower i) (I.upper i)⟩ -- Porting note: added @[coe] def toSet (I : Box ι) : Set (ι → ℝ) := { x \| x ∈ I } instance : CoeTC (Box ι) (Set <\| ι → ℝ) := ⟨toSet⟩ @[simp] theorem mem_mk {l u x : ι → ℝ} {H} : x ∈ mk l u H ↔ ∀ i, x i ∈ Ioc (l i) (u i) := Iff.rfl #align box_integral.box.mem_mk BoxIntegral.Box.mem_mk @[simp, norm_cast] theorem mem_coe : x ∈ (I : Set (ι → ℝ)) ↔ x ∈ I := Iff.rfl #align box_integral.box.mem_coe BoxIntegral.Box.mem_coe theorem mem_def : x ∈ I ↔ ∀ i, x i ∈ Ioc (I.lower i) (I.upper i) := Iff.rfl #align box_integral.box.mem_def BoxIntegral.Box.mem_def theorem mem_univ_Ioc {I : Box ι} : (x ∈ pi univ fun i ↦ Ioc (I.lower i) (I.upper i)) ↔ x ∈ I := mem_univ_pi #align box_integral.box.mem_univ_Ioc BoxIntegral.Box.mem_univ_Ioc theorem coe_eq_pi : (I : Set (ι → ℝ)) = pi univ fun i ↦ Ioc (I.lower i) (I.upper i) := Set.ext fun _ ↦ mem_univ_Ioc.symm #align box_integral.box.coe_eq_pi BoxIntegral.Box.coe_eq_pi @[simp] theorem upper_mem : I.upper ∈ I := fun i ↦ right_mem_Ioc.2 <\| I.lower_lt_upper i #align box_integral.box.upper_mem BoxIntegral.Box.upper_mem theorem exists_mem : ∃ x, x ∈ I := ⟨_, I.upper_mem⟩ #align box_integral.box.exists_mem BoxIntegral.Box.exists_mem theorem nonempty_coe : Set.Nonempty (I : Set (ι → ℝ)) := I.exists_mem #align box_integral.box.nonempty_coe BoxIntegral.Box.nonempty_coe @[simp] theorem coe_ne_empty : (I : Set (ι → ℝ)) ≠ ∅ := I.nonempty_coe.ne_empty #align box_integral.box.coe_ne_empty BoxIntegral.Box.coe_ne_empty @[simp] theorem empty_ne_coe : ∅ ≠ (I : Set (ι → ℝ)) := I.coe_ne_empty.symm #align box_integral.box.empty_ne_coe BoxIntegral.Box.empty_ne_coe instance : LE (Box ι) := ⟨fun I J ↦ ∀ ⦃x⦄, x ∈ I → x ∈ J⟩ theorem le_def : I ≤ J ↔ ∀ x ∈ I, x ∈ J := Iff.rfl #align box_integral.box.le_def BoxIntegral.Box.le_def theorem le_TFAE : List.TFAE [I ≤ J, (I : Set (ι → ℝ)) ⊆ J, Icc I.lower I.upper ⊆ Icc J.lower J.upper, J.lower ≤ I.lower ∧ I.upper ≤ J.upper] := by tfae_have 1 ↔ 2 · exact Iff.rfl tfae_have 2 → 3 · intro h simpa [coe_eq_pi, closure_pi_set, lower_ne_upper] using closure_mono h tfae_have 3 ↔ 4 · exact Icc_subset_Icc_iff I.lower_le_upper tfae_have 4 → 2 · exact fun h x hx i ↦ Ioc_subset_Ioc (h.1 i) (h.2 i) (hx i) tfae_finish #align box_integral.box.le_tfae BoxIntegral.Box.le_TFAE variable {I J} @[simp, norm_cast] theorem coe_subset_coe : (I : Set (ι → ℝ)) ⊆ J ↔ I ≤ J := Iff.rfl #align box_integral.box.coe_subset_coe BoxIntegral.Box.coe_subset_coe theorem le_iff_bounds : I ≤ J ↔ J.lower ≤ I.lower ∧ I.upper ≤ J.upper := (le_TFAE I J).out 0 3 #align box_integral.box.le_iff_bounds BoxIntegral.Box.le_iff_bounds theorem injective_coe : Injective ((↑) : Box ι → Set (ι → ℝ)) := by rintro ⟨l₁, u₁, h₁⟩ ⟨l₂, u₂, h₂⟩ h simp only [Subset.antisymm_iff, coe_subset_coe, le_iff_bounds] at h congr exacts [le_antisymm h.2.1 h.1.1, le_antisymm h.1.2 h.2.2] #align box_integral.box.injective_coe BoxIntegral.Box.injective_coe @[simp, norm_cast] theorem coe_inj : (I : Set (ι → ℝ)) = J ↔ I = J := injective_coe.eq_iff #align box_integral.box.coe_inj BoxIntegral.Box.coe_inj @[ext] theorem ext (H : ∀ x, x ∈ I ↔ x ∈ J) : I = J := injective_coe <\| Set.ext H #align box_integral.box.ext BoxIntegral.Box.ext theorem ne_of_disjoint_coe (h : Disjoint (I : Set (ι → ℝ)) J) : I ≠ J := mt coe_inj.2 <\| h.ne I.coe_ne_empty #align box_integral.box.ne_of_disjoint_coe BoxIntegral.Box.ne_of_disjoint_coe instance : PartialOrder (Box ι) := { PartialOrder.lift ((↑) : Box ι → Set (ι → ℝ)) injective_coe with le := (· ≤ ·) } protected def Icc : Box ι ↪o Set (ι → ℝ) := OrderEmbedding.ofMapLEIff (fun I : Box ι ↦ Icc I.lower I.upper) fun I J ↦ (le_TFAE I J).out 2 0 #align box_integral.box.Icc BoxIntegral.Box.Icc theorem Icc_def : Box.Icc I = Icc I.lower I.upper := rfl #align box_integral.box.Icc_def BoxIntegral.Box.Icc_def @[simp] theorem upper_mem_Icc (I : Box ι) : I.upper ∈ Box.Icc I := right_mem_Icc.2 I.lower_le_upper #align box_integral.box.upper_mem_Icc BoxIntegral.Box.upper_mem_Icc @[simp] theorem lower_mem_Icc (I : Box ι) : I.lower ∈ Box.Icc I := left_mem_Icc.2 I.lower_le_upper #align box_integral.box.lower_mem_Icc BoxIntegral.Box.lower_mem_Icc protected theorem isCompact_Icc (I : Box ι) : IsCompact (Box.Icc I) := isCompact_Icc #align box_integral.box.is_compact_Icc BoxIntegral.Box.isCompact_Icc theorem Icc_eq_pi : Box.Icc I = pi univ fun i ↦ Icc (I.lower i) (I.upper i) := (pi_univ_Icc _ _).symm #align box_integral.box.Icc_eq_pi BoxIntegral.Box.Icc_eq_pi theorem le_iff_Icc : I ≤ J ↔ Box.Icc I ⊆ Box.Icc J := (le_TFAE I J).out 0 2 #align box_integral.box.le_iff_Icc BoxIntegral.Box.le_iff_Icc theorem antitone_lower : Antitone fun I : Box ι ↦ I.lower := fun _ _ H ↦ (le_iff_bounds.1 H).1 #align box_integral.box.antitone_lower BoxIntegral.Box.antitone_lower theorem monotone_upper : Monotone fun I : Box ι ↦ I.upper := fun _ _ H ↦ (le_iff_bounds.1 H).2 #align box_integral.box.monotone_upper BoxIntegral.Box.monotone_upper theorem coe_subset_Icc : ↑I ⊆ Box.Icc I := fun _ hx ↦ ⟨fun i ↦ (hx i).1.le, fun i ↦ (hx i).2⟩ #align box_integral.box.coe_subset_Icc BoxIntegral.Box.coe_subset_Icc instance : Sup (Box ι) := ⟨fun I J ↦ ⟨I.lower ⊓ J.lower, I.upper ⊔ J.upper, fun i ↦ (min_le_left _ _).trans_lt <\| (I.lower_lt_upper i).trans_le (le_max_left _ _)⟩⟩ instance : SemilatticeSup (Box ι) := { (inferInstance : PartialOrder (Box ι)), (inferInstance : Sup (Box ι)) with le_sup_left := fun _ _ ↦ le_iff_bounds.2 ⟨inf_le_left, le_sup_left⟩ le_sup_right := fun _ _ ↦ le_iff_bounds.2 ⟨inf_le_right, le_sup_right⟩ sup_le := fun _ _ _ h₁ h₂ ↦ le_iff_bounds.2 ⟨le_inf (antitone_lower h₁) (antitone_lower h₂), sup_le (monotone_upper h₁) (monotone_upper h₂)⟩ } -- Porting note: added @[coe] def withBotToSet (o : WithBot (Box ι)) : Set (ι → ℝ) := o.elim ∅ (↑) instance withBotCoe : CoeTC (WithBot (Box ι)) (Set (ι → ℝ)) := ⟨withBotToSet⟩ #align box_integral.box.with_bot_coe BoxIntegral.Box.withBotCoe @[simp, norm_cast] theorem coe_bot : ((⊥ : WithBot (Box ι)) : Set (ι → ℝ)) = ∅ := rfl #align box_integral.box.coe_bot BoxIntegral.Box.coe_bot @[simp, norm_cast] theorem coe_coe : ((I : WithBot (Box ι)) : Set (ι → ℝ)) = I := rfl #align box_integral.box.coe_coe BoxIntegral.Box.coe_coe theorem isSome_iff : ∀ {I : WithBot (Box ι)}, I.isSome ↔ (I : Set (ι → ℝ)).Nonempty \| ⊥ => by erw [Option.isSome] simp \| (I : Box ι) => by erw [Option.isSome] simp [I.nonempty_coe] #align box_integral.box.is_some_iff BoxIntegral.Box.isSome_iff theorem biUnion_coe_eq_coe (I : WithBot (Box ι)) : ⋃ (J : Box ι) (_ : ↑J = I), (J : Set (ι → ℝ)) = I := by induction I <;> simp [WithBot.coe_eq_coe] #align box_integral.box.bUnion_coe_eq_coe BoxIntegral.Box.biUnion_coe_eq_coe @[simp, norm_cast] theorem withBotCoe_subset_iff {I J : WithBot (Box ι)} : (I : Set (ι → ℝ)) ⊆ J ↔ I ≤ J := by induction I; · simp induction J; · simp [subset_empty_iff] simp [le_def] #align box_integral.box.with_bot_coe_subset_iff BoxIntegral.Box.withBotCoe_subset_iff @[simp, norm_cast] theorem withBotCoe_inj {I J : WithBot (Box ι)} : (I : Set (ι → ℝ)) = J ↔ I = J := by simp only [Subset.antisymm_iff, ← le_antisymm_iff, withBotCoe_subset_iff] #align box_integral.box.with_bot_coe_inj BoxIntegral.Box.withBotCoe_inj def mk' (l u : ι → ℝ) : WithBot (Box ι) := if h : ∀ i, l i < u i then ↑(⟨l, u, h⟩ : Box ι) else ⊥ #align box_integral.box.mk' BoxIntegral.Box.mk' @[simp] theorem mk'_eq_bot {l u : ι → ℝ} : mk' l u = ⊥ ↔ ∃ i, u i ≤ l i := by rw [mk'] split_ifs with h <;> simpa using h #align box_integral.box.mk'_eq_bot BoxIntegral.Box.mk'_eq_bot @[simp] theorem mk'_eq_coe {l u : ι → ℝ} : mk' l u = I ↔ l = I.lower ∧ u = I.upper := by cases' I with lI uI hI; rw [mk']; split_ifs with h · simp [WithBot.coe_eq_coe] · suffices l = lI → u ≠ uI by simpa rintro rfl rfl exact h hI #align box_integral.box.mk'_eq_coe BoxIntegral.Box.mk'_eq_coe @[simp] theorem coe_mk' (l u : ι → ℝ) : (mk' l u : Set (ι → ℝ)) = pi univ fun i ↦ Ioc (l i) (u i) := by rw [mk']; split_ifs with h · exact coe_eq_pi _ · rcases not_forall.mp h with ⟨i, hi⟩ rw [coe_bot, univ_pi_eq_empty] exact Ioc_eq_empty hi #align box_integral.box.coe_mk' BoxIntegral.Box.coe_mk' instance WithBot.inf : Inf (WithBot (Box ι)) := ⟨fun I ↦ WithBot.recBotCoe (fun _ ↦ ⊥) (fun I J ↦ WithBot.recBotCoe ⊥ (fun J ↦ mk' (I.lower ⊔ J.lower) (I.upper ⊓ J.upper)) J) I⟩ @[simp] theorem coe_inf (I J : WithBot (Box ι)) : (↑(I ⊓ J) : Set (ι → ℝ)) = (I : Set _) ∩ J := by induction I · change ∅ = _ simp induction J · change ∅ = _ simp change ((mk' _ _ : WithBot (Box ι)) : Set (ι → ℝ)) = _ simp only [coe_eq_pi, ← pi_inter_distrib, Ioc_inter_Ioc, Pi.sup_apply, Pi.inf_apply, coe_mk', coe_coe] #align box_integral.box.coe_inf BoxIntegral.Box.coe_inf instance : Lattice (WithBot (Box ι)) := { WithBot.semilatticeSup, Box.WithBot.inf with inf_le_left := fun I J ↦ by rw [← withBotCoe_subset_iff, coe_inf] exact inter_subset_left inf_le_right := fun I J ↦ by rw [← withBotCoe_subset_iff, coe_inf] exact inter_subset_right le_inf := fun I J₁ J₂ h₁ h₂ ↦ by simp only [← withBotCoe_subset_iff, coe_inf] at * exact subset_inter h₁ h₂ } @[simp, norm_cast] theorem disjoint_withBotCoe {I J : WithBot (Box ι)} : Disjoint (I : Set (ι → ℝ)) J ↔ Disjoint I J := by simp only [disjoint_iff_inf_le, ← withBotCoe_subset_iff, coe_inf] rfl #align box_integral.box.disjoint_with_bot_coe BoxIntegral.Box.disjoint_withBotCoe theorem disjoint_coe : Disjoint (I : WithBot (Box ι)) J ↔ Disjoint (I : Set (ι → ℝ)) J := disjoint_withBotCoe.symm #align box_integral.box.disjoint_coe BoxIntegral.Box.disjoint_coe	Mathlib/Analysis/BoxIntegral/Box/Basic.lean	389	391	theorem not_disjoint_coe_iff_nonempty_inter : ¬Disjoint (I : WithBot (Box ι)) J ↔ (I ∩ J : Set (ι → ℝ)).Nonempty := by	rw [disjoint_coe, Set.not_disjoint_iff_nonempty_inter]
import Mathlib.NumberTheory.Divisors import Mathlib.Data.Nat.Digits import Mathlib.Data.Nat.MaxPowDiv import Mathlib.Data.Nat.Multiplicity import Mathlib.Tactic.IntervalCases #align_import number_theory.padics.padic_val from "leanprover-community/mathlib"@"60fa54e778c9e85d930efae172435f42fb0d71f7" universe u open Nat open Rat open multiplicity def padicValNat (p : ℕ) (n : ℕ) : ℕ := if h : p ≠ 1 ∧ 0 < n then (multiplicity p n).get (multiplicity.finite_nat_iff.2 h) else 0 #align padic_val_nat padicValNat def padicValInt (p : ℕ) (z : ℤ) : ℕ := padicValNat p z.natAbs #align padic_val_int padicValInt namespace padicValInt open multiplicity variable {p : ℕ}	Mathlib/NumberTheory/Padics/PadicVal.lean	162	169	theorem of_ne_one_ne_zero {z : ℤ} (hp : p ≠ 1) (hz : z ≠ 0) : padicValInt p z = (multiplicity (p : ℤ) z).get (by apply multiplicity.finite_int_iff.2 simp [hp, hz]) := by	rw [padicValInt, padicValNat, dif_pos (And.intro hp (Int.natAbs_pos.mpr hz))] simp only [multiplicity.Int.natAbs p z]
import Mathlib.Data.Nat.Defs import Mathlib.Order.Interval.Set.Basic import Mathlib.Tactic.Monotonicity.Attr #align_import data.nat.log from "leanprover-community/mathlib"@"3e00d81bdcbf77c8188bbd18f5524ddc3ed8cac6" namespace Nat --@[pp_nodot] porting note: unknown attribute def log (b : ℕ) : ℕ → ℕ \| n => if h : b ≤ n ∧ 1 < b then log b (n / b) + 1 else 0 decreasing_by -- putting this in the def triggers the `unusedHavesSuffices` linter: -- https://github.com/leanprover-community/batteries/issues/428 have : n / b < n := div_lt_self ((Nat.zero_lt_one.trans h.2).trans_le h.1) h.2 decreasing_trivial #align nat.log Nat.log @[simp] theorem log_eq_zero_iff {b n : ℕ} : log b n = 0 ↔ n < b ∨ b ≤ 1 := by rw [log, dite_eq_right_iff] simp only [Nat.add_eq_zero_iff, Nat.one_ne_zero, and_false, imp_false, not_and_or, not_le, not_lt] #align nat.log_eq_zero_iff Nat.log_eq_zero_iff theorem log_of_lt {b n : ℕ} (hb : n < b) : log b n = 0 := log_eq_zero_iff.2 (Or.inl hb) #align nat.log_of_lt Nat.log_of_lt theorem log_of_left_le_one {b : ℕ} (hb : b ≤ 1) (n) : log b n = 0 := log_eq_zero_iff.2 (Or.inr hb) #align nat.log_of_left_le_one Nat.log_of_left_le_one @[simp] theorem log_pos_iff {b n : ℕ} : 0 < log b n ↔ b ≤ n ∧ 1 < b := by rw [Nat.pos_iff_ne_zero, Ne, log_eq_zero_iff, not_or, not_lt, not_le] #align nat.log_pos_iff Nat.log_pos_iff theorem log_pos {b n : ℕ} (hb : 1 < b) (hbn : b ≤ n) : 0 < log b n := log_pos_iff.2 ⟨hbn, hb⟩ #align nat.log_pos Nat.log_pos theorem log_of_one_lt_of_le {b n : ℕ} (h : 1 < b) (hn : b ≤ n) : log b n = log b (n / b) + 1 := by rw [log] exact if_pos ⟨hn, h⟩ #align nat.log_of_one_lt_of_le Nat.log_of_one_lt_of_le @[simp] lemma log_zero_left : ∀ n, log 0 n = 0 := log_of_left_le_one $ Nat.zero_le _ #align nat.log_zero_left Nat.log_zero_left @[simp] theorem log_zero_right (b : ℕ) : log b 0 = 0 := log_eq_zero_iff.2 (le_total 1 b) #align nat.log_zero_right Nat.log_zero_right @[simp] theorem log_one_left : ∀ n, log 1 n = 0 := log_of_left_le_one le_rfl #align nat.log_one_left Nat.log_one_left @[simp] theorem log_one_right (b : ℕ) : log b 1 = 0 := log_eq_zero_iff.2 (lt_or_le _ _) #align nat.log_one_right Nat.log_one_right theorem pow_le_iff_le_log {b : ℕ} (hb : 1 < b) {x y : ℕ} (hy : y ≠ 0) : b ^ x ≤ y ↔ x ≤ log b y := by induction' y using Nat.strong_induction_on with y ih generalizing x cases x with \| zero => dsimp; omega \| succ x => rw [log]; split_ifs with h · have b_pos : 0 < b := lt_of_succ_lt hb rw [Nat.add_le_add_iff_right, ← ih (y / b) (div_lt_self (Nat.pos_iff_ne_zero.2 hy) hb) (Nat.div_pos h.1 b_pos).ne', le_div_iff_mul_le b_pos, pow_succ', Nat.mul_comm] · exact iff_of_false (fun hby => h ⟨(le_self_pow x.succ_ne_zero _).trans hby, hb⟩) (not_succ_le_zero _) #align nat.pow_le_iff_le_log Nat.pow_le_iff_le_log theorem lt_pow_iff_log_lt {b : ℕ} (hb : 1 < b) {x y : ℕ} (hy : y ≠ 0) : y < b ^ x ↔ log b y < x := lt_iff_lt_of_le_iff_le (pow_le_iff_le_log hb hy) #align nat.lt_pow_iff_log_lt Nat.lt_pow_iff_log_lt theorem pow_le_of_le_log {b x y : ℕ} (hy : y ≠ 0) (h : x ≤ log b y) : b ^ x ≤ y := by refine (le_or_lt b 1).elim (fun hb => ?_) fun hb => (pow_le_iff_le_log hb hy).2 h rw [log_of_left_le_one hb, Nat.le_zero] at h rwa [h, Nat.pow_zero, one_le_iff_ne_zero] #align nat.pow_le_of_le_log Nat.pow_le_of_le_log theorem le_log_of_pow_le {b x y : ℕ} (hb : 1 < b) (h : b ^ x ≤ y) : x ≤ log b y := by rcases ne_or_eq y 0 with (hy \| rfl) exacts [(pow_le_iff_le_log hb hy).1 h, (h.not_lt (Nat.pow_pos (Nat.zero_lt_one.trans hb))).elim] #align nat.le_log_of_pow_le Nat.le_log_of_pow_le theorem pow_log_le_self (b : ℕ) {x : ℕ} (hx : x ≠ 0) : b ^ log b x ≤ x := pow_le_of_le_log hx le_rfl #align nat.pow_log_le_self Nat.pow_log_le_self theorem log_lt_of_lt_pow {b x y : ℕ} (hy : y ≠ 0) : y < b ^ x → log b y < x := lt_imp_lt_of_le_imp_le (pow_le_of_le_log hy) #align nat.log_lt_of_lt_pow Nat.log_lt_of_lt_pow theorem lt_pow_of_log_lt {b x y : ℕ} (hb : 1 < b) : log b y < x → y < b ^ x := lt_imp_lt_of_le_imp_le (le_log_of_pow_le hb) #align nat.lt_pow_of_log_lt Nat.lt_pow_of_log_lt theorem lt_pow_succ_log_self {b : ℕ} (hb : 1 < b) (x : ℕ) : x < b ^ (log b x).succ := lt_pow_of_log_lt hb (lt_succ_self _) #align nat.lt_pow_succ_log_self Nat.lt_pow_succ_log_self theorem log_eq_iff {b m n : ℕ} (h : m ≠ 0 ∨ 1 < b ∧ n ≠ 0) : log b n = m ↔ b ^ m ≤ n ∧ n < b ^ (m + 1) := by rcases em (1 < b ∧ n ≠ 0) with (⟨hb, hn⟩ \| hbn) · rw [le_antisymm_iff, ← Nat.lt_succ_iff, ← pow_le_iff_le_log, ← lt_pow_iff_log_lt, and_comm] <;> assumption have hm : m ≠ 0 := h.resolve_right hbn rw [not_and_or, not_lt, Ne, not_not] at hbn rcases hbn with (hb \| rfl) · obtain rfl \| rfl := le_one_iff_eq_zero_or_eq_one.1 hb any_goals simp only [ne_eq, zero_eq, reduceSucc, lt_self_iff_false, not_lt_zero, false_and, or_false] at h simp [h, eq_comm (a := 0), Nat.zero_pow (Nat.pos_iff_ne_zero.2 _)] <;> omega · simp [@eq_comm _ 0, hm] #align nat.log_eq_iff Nat.log_eq_iff theorem log_eq_of_pow_le_of_lt_pow {b m n : ℕ} (h₁ : b ^ m ≤ n) (h₂ : n < b ^ (m + 1)) : log b n = m := by rcases eq_or_ne m 0 with (rfl \| hm) · rw [Nat.pow_one] at h₂ exact log_of_lt h₂ · exact (log_eq_iff (Or.inl hm)).2 ⟨h₁, h₂⟩ #align nat.log_eq_of_pow_le_of_lt_pow Nat.log_eq_of_pow_le_of_lt_pow theorem log_pow {b : ℕ} (hb : 1 < b) (x : ℕ) : log b (b ^ x) = x := log_eq_of_pow_le_of_lt_pow le_rfl (Nat.pow_lt_pow_right hb x.lt_succ_self) #align nat.log_pow Nat.log_pow theorem log_eq_one_iff' {b n : ℕ} : log b n = 1 ↔ b ≤ n ∧ n < b * b := by rw [log_eq_iff (Or.inl Nat.one_ne_zero), Nat.pow_add, Nat.pow_one] #align nat.log_eq_one_iff' Nat.log_eq_one_iff' theorem log_eq_one_iff {b n : ℕ} : log b n = 1 ↔ n < b * b ∧ 1 < b ∧ b ≤ n := log_eq_one_iff'.trans ⟨fun h => ⟨h.2, lt_mul_self_iff.1 (h.1.trans_lt h.2), h.1⟩, fun h => ⟨h.2.2, h.1⟩⟩ #align nat.log_eq_one_iff Nat.log_eq_one_iff theorem log_mul_base {b n : ℕ} (hb : 1 < b) (hn : n ≠ 0) : log b (n * b) = log b n + 1 := by apply log_eq_of_pow_le_of_lt_pow <;> rw [pow_succ', Nat.mul_comm b] exacts [Nat.mul_le_mul_right _ (pow_log_le_self _ hn), (Nat.mul_lt_mul_right (Nat.zero_lt_one.trans hb)).2 (lt_pow_succ_log_self hb _)] #align nat.log_mul_base Nat.log_mul_base theorem pow_log_le_add_one (b : ℕ) : ∀ x, b ^ log b x ≤ x + 1 \| 0 => by rw [log_zero_right, Nat.pow_zero] \| x + 1 => (pow_log_le_self b x.succ_ne_zero).trans (x + 1).le_succ #align nat.pow_log_le_add_one Nat.pow_log_le_add_one theorem log_monotone {b : ℕ} : Monotone (log b) := by refine monotone_nat_of_le_succ fun n => ?_ rcases le_or_lt b 1 with hb \| hb · rw [log_of_left_le_one hb] exact zero_le _ · exact le_log_of_pow_le hb (pow_log_le_add_one _ _) #align nat.log_monotone Nat.log_monotone @[mono] theorem log_mono_right {b n m : ℕ} (h : n ≤ m) : log b n ≤ log b m := log_monotone h #align nat.log_mono_right Nat.log_mono_right @[mono] theorem log_anti_left {b c n : ℕ} (hc : 1 < c) (hb : c ≤ b) : log b n ≤ log c n := by rcases eq_or_ne n 0 with (rfl \| hn); · rw [log_zero_right, log_zero_right] apply le_log_of_pow_le hc calc c ^ log b n ≤ b ^ log b n := Nat.pow_le_pow_left hb _ _ ≤ n := pow_log_le_self _ hn #align nat.log_anti_left Nat.log_anti_left theorem log_antitone_left {n : ℕ} : AntitoneOn (fun b => log b n) (Set.Ioi 1) := fun _ hc _ _ hb => log_anti_left (Set.mem_Iio.1 hc) hb #align nat.log_antitone_left Nat.log_antitone_left @[simp] theorem log_div_base (b n : ℕ) : log b (n / b) = log b n - 1 := by rcases le_or_lt b 1 with hb \| hb · rw [log_of_left_le_one hb, log_of_left_le_one hb, Nat.zero_sub] cases' lt_or_le n b with h h · rw [div_eq_of_lt h, log_of_lt h, log_zero_right] rw [log_of_one_lt_of_le hb h, Nat.add_sub_cancel_right] #align nat.log_div_base Nat.log_div_base @[simp] theorem log_div_mul_self (b n : ℕ) : log b (n / b * b) = log b n := by rcases le_or_lt b 1 with hb \| hb · rw [log_of_left_le_one hb, log_of_left_le_one hb] cases' lt_or_le n b with h h · rw [div_eq_of_lt h, Nat.zero_mul, log_zero_right, log_of_lt h] rw [log_mul_base hb (Nat.div_pos h (by omega)).ne', log_div_base, Nat.sub_add_cancel (succ_le_iff.2 <\| log_pos hb h)] #align nat.log_div_mul_self Nat.log_div_mul_self theorem add_pred_div_lt {b n : ℕ} (hb : 1 < b) (hn : 2 ≤ n) : (n + b - 1) / b < n := by rw [div_lt_iff_lt_mul (by omega), ← succ_le_iff, ← pred_eq_sub_one, succ_pred_eq_of_pos (by omega)] exact Nat.add_le_mul hn hb -- Porting note: Was private in mathlib 3 -- #align nat.add_pred_div_lt Nat.add_pred_div_lt --@[pp_nodot] def clog (b : ℕ) : ℕ → ℕ \| n => if h : 1 < b ∧ 1 < n then clog b ((n + b - 1) / b) + 1 else 0 decreasing_by -- putting this in the def triggers the `unusedHavesSuffices` linter: -- https://github.com/leanprover-community/batteries/issues/428 have : (n + b - 1) / b < n := add_pred_div_lt h.1 h.2 decreasing_trivial #align nat.clog Nat.clog theorem clog_of_left_le_one {b : ℕ} (hb : b ≤ 1) (n : ℕ) : clog b n = 0 := by rw [clog, dif_neg fun h : 1 < b ∧ 1 < n => h.1.not_le hb] #align nat.clog_of_left_le_one Nat.clog_of_left_le_one	Mathlib/Data/Nat/Log.lean	255	256	theorem clog_of_right_le_one {n : ℕ} (hn : n ≤ 1) (b : ℕ) : clog b n = 0 := by	rw [clog, dif_neg fun h : 1 < b ∧ 1 < n => h.2.not_le hn]
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 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] #align typevec.repeat_eq_iff_eq TypeVec.repeatEq_iff_eq def Subtype_ : ∀ {n} {α : TypeVec.{u} n}, (α ⟹ «repeat» n Prop) → TypeVec n \| _, _, p, Fin2.fz => Subtype fun x => p Fin2.fz x \| _, _, p, Fin2.fs i => Subtype_ (dropFun p) i #align typevec.subtype_ TypeVec.Subtype_ def subtypeVal : ∀ {n} {α : TypeVec.{u} n} (p : α ⟹ «repeat» n Prop), Subtype_ p ⟹ α \| succ n, _, _, Fin2.fs i => @subtypeVal n _ _ i \| succ _, _, _, Fin2.fz => Subtype.val #align typevec.subtype_val TypeVec.subtypeVal def toSubtype : ∀ {n} {α : TypeVec.{u} n} (p : α ⟹ «repeat» n Prop), (fun i : Fin2 n => { x // ofRepeat <\| p i x }) ⟹ Subtype_ p \| succ _, _, p, Fin2.fs i, x => toSubtype (dropFun p) i x \| succ _, _, _, Fin2.fz, x => x #align typevec.to_subtype TypeVec.toSubtype def ofSubtype {n} {α : TypeVec.{u} n} (p : α ⟹ «repeat» n Prop) : Subtype_ p ⟹ fun i : Fin2 n => { x // ofRepeat <\| p i x } \| Fin2.fs i, x => ofSubtype _ i x \| Fin2.fz, x => x #align typevec.of_subtype TypeVec.ofSubtype def toSubtype' {n} {α : TypeVec.{u} n} (p : α ⊗ α ⟹ «repeat» n Prop) : (fun i : Fin2 n => { x : α i × α i // ofRepeat <\| p i (prod.mk _ x.1 x.2) }) ⟹ Subtype_ p \| Fin2.fs i, x => toSubtype' (dropFun p) i x \| Fin2.fz, x => ⟨x.val, cast (by congr) x.property⟩ #align typevec.to_subtype' TypeVec.toSubtype' def ofSubtype' {n} {α : TypeVec.{u} n} (p : α ⊗ α ⟹ «repeat» n Prop) : Subtype_ p ⟹ fun i : Fin2 n => { x : α i × α i // ofRepeat <\| p i (prod.mk _ x.1 x.2) } \| Fin2.fs i, x => ofSubtype' _ i x \| Fin2.fz, x => ⟨x.val, cast (by congr) x.property⟩ #align typevec.of_subtype' TypeVec.ofSubtype' def diagSub {n} {α : TypeVec.{u} n} : α ⟹ Subtype_ (repeatEq α) \| Fin2.fs _, x => @diagSub _ (drop α) _ x \| Fin2.fz, x => ⟨(x, x), rfl⟩ #align typevec.diag_sub TypeVec.diagSub theorem subtypeVal_nil {α : TypeVec.{u} 0} (ps : α ⟹ «repeat» 0 Prop) : TypeVec.subtypeVal ps = nilFun := funext <\| by rintro ⟨⟩ #align typevec.subtype_val_nil TypeVec.subtypeVal_nil	Mathlib/Data/TypeVec.lean	645	649	theorem diag_sub_val {n} {α : TypeVec.{u} n} : subtypeVal (repeatEq α) ⊚ diagSub = prod.diag := by	ext i x induction' i with _ _ _ i_ih · simp only [comp, subtypeVal, repeatEq.eq_2, diagSub, prod.diag] apply @i_ih (drop α)
import Mathlib.Algebra.QuadraticDiscriminant import Mathlib.Analysis.Convex.SpecificFunctions.Deriv import Mathlib.Analysis.SpecialFunctions.Pow.Complex #align_import analysis.special_functions.trigonometric.complex from "leanprover-community/mathlib"@"8f9fea08977f7e450770933ee6abb20733b47c92" noncomputable section namespace Complex open Set Filter open scoped Real theorem cos_eq_zero_iff {θ : ℂ} : cos θ = 0 ↔ ∃ k : ℤ, θ = (2 * k + 1) * π / 2 := by have h : (exp (θ * I) + exp (-θ * I)) / 2 = 0 ↔ exp (2 * θ * I) = -1 := by rw [@div_eq_iff _ _ (exp (θ * I) + exp (-θ * I)) 2 0 two_ne_zero, zero_mul, add_eq_zero_iff_eq_neg, neg_eq_neg_one_mul, ← div_eq_iff (exp_ne_zero _), ← exp_sub] ring_nf rw [cos, h, ← exp_pi_mul_I, exp_eq_exp_iff_exists_int, mul_right_comm] refine exists_congr fun x => ?_ refine (iff_of_eq <\| congr_arg _ ?_).trans (mul_right_inj' <\| mul_ne_zero two_ne_zero I_ne_zero) field_simp; ring #align complex.cos_eq_zero_iff Complex.cos_eq_zero_iff theorem cos_ne_zero_iff {θ : ℂ} : cos θ ≠ 0 ↔ ∀ k : ℤ, θ ≠ (2 * k + 1) * π / 2 := by rw [← not_exists, not_iff_not, cos_eq_zero_iff] #align complex.cos_ne_zero_iff Complex.cos_ne_zero_iff theorem sin_eq_zero_iff {θ : ℂ} : sin θ = 0 ↔ ∃ k : ℤ, θ = k * π := by rw [← Complex.cos_sub_pi_div_two, cos_eq_zero_iff] constructor · rintro ⟨k, hk⟩ use k + 1 field_simp [eq_add_of_sub_eq hk] ring · rintro ⟨k, rfl⟩ use k - 1 field_simp ring #align complex.sin_eq_zero_iff Complex.sin_eq_zero_iff theorem sin_ne_zero_iff {θ : ℂ} : sin θ ≠ 0 ↔ ∀ k : ℤ, θ ≠ k * π := by rw [← not_exists, not_iff_not, sin_eq_zero_iff] #align complex.sin_ne_zero_iff Complex.sin_ne_zero_iff	Mathlib/Analysis/SpecialFunctions/Trigonometric/Complex.lean	69	72	theorem tan_eq_zero_iff {θ : ℂ} : tan θ = 0 ↔ ∃ k : ℤ, k * π / 2 = θ := by	rw [tan, div_eq_zero_iff, ← mul_eq_zero, ← mul_right_inj' two_ne_zero, mul_zero, ← mul_assoc, ← sin_two_mul, sin_eq_zero_iff] field_simp [mul_comm, eq_comm]
import Mathlib.Algebra.Order.Ring.Rat import Mathlib.Data.Rat.Cast.CharZero import Mathlib.Tactic.Positivity.Core import Mathlib.Algebra.Order.Field.Basic #align_import data.rat.cast from "leanprover-community/mathlib"@"acebd8d49928f6ed8920e502a6c90674e75bd441" variable {F ι α β : Type} namespace Rat variable {p q : ℚ} @[simp] theorem castHom_rat : castHom ℚ = RingHom.id ℚ := RingHom.ext cast_id #align rat.cast_hom_rat Rat.castHom_rat section LinearOrderedField variable {K : Type} [LinearOrderedField K]	Mathlib/Data/Rat/Cast/Order.lean	31	33	theorem cast_pos_of_pos (hq : 0 < q) : (0 : K) < q := by	rw [Rat.cast_def] exact div_pos (Int.cast_pos.2 <\| num_pos.2 hq) (Nat.cast_pos.2 q.pos)
import Mathlib.Data.ZMod.Basic import Mathlib.GroupTheory.Index import Mathlib.GroupTheory.GroupAction.ConjAct import Mathlib.GroupTheory.GroupAction.Quotient import Mathlib.GroupTheory.Perm.Cycle.Type import Mathlib.GroupTheory.SpecificGroups.Cyclic import Mathlib.Tactic.IntervalCases #align_import group_theory.p_group from "leanprover-community/mathlib"@"f694c7dead66f5d4c80f446c796a5aad14707f0e" open Fintype MulAction variable (p : ℕ) (G : Type) [Group G] def IsPGroup : Prop := ∀ g : G, ∃ k : ℕ, g ^ p ^ k = 1 #align is_p_group IsPGroup variable {p} {G} namespace IsPGroup theorem iff_orderOf [hp : Fact p.Prime] : IsPGroup p G ↔ ∀ g : G, ∃ k : ℕ, orderOf g = p ^ k := forall_congr' fun g => ⟨fun ⟨k, hk⟩ => Exists.imp (fun _ h => h.right) ((Nat.dvd_prime_pow hp.out).mp (orderOf_dvd_of_pow_eq_one hk)), Exists.imp fun k hk => by rw [← hk, pow_orderOf_eq_one]⟩ #align is_p_group.iff_order_of IsPGroup.iff_orderOf theorem of_card [Fintype G] {n : ℕ} (hG : card G = p ^ n) : IsPGroup p G := fun g => ⟨n, by rw [← hG, pow_card_eq_one]⟩ #align is_p_group.of_card IsPGroup.of_card theorem of_bot : IsPGroup p (⊥ : Subgroup G) := of_card (by rw [← Nat.card_eq_fintype_card, Subgroup.card_bot, pow_zero]) #align is_p_group.of_bot IsPGroup.of_bot theorem iff_card [Fact p.Prime] [Fintype G] : IsPGroup p G ↔ ∃ n : ℕ, card G = p ^ n := by have hG : card G ≠ 0 := card_ne_zero refine ⟨fun h => ?_, fun ⟨n, hn⟩ => of_card hn⟩ suffices ∀ q ∈ Nat.factors (card G), q = p by use (card G).factors.length rw [← List.prod_replicate, ← List.eq_replicate_of_mem this, Nat.prod_factors hG] intro q hq obtain ⟨hq1, hq2⟩ := (Nat.mem_factors hG).mp hq haveI : Fact q.Prime := ⟨hq1⟩ obtain ⟨g, hg⟩ := exists_prime_orderOf_dvd_card q hq2 obtain ⟨k, hk⟩ := (iff_orderOf.mp h) g exact (hq1.pow_eq_iff.mp (hg.symm.trans hk).symm).1.symm #align is_p_group.iff_card IsPGroup.iff_card alias ⟨exists_card_eq, _⟩ := iff_card section GIsPGroup variable (hG : IsPGroup p G) theorem of_injective {H : Type} [Group H] (ϕ : H →* G) (hϕ : Function.Injective ϕ) : IsPGroup p H := by simp_rw [IsPGroup, ← hϕ.eq_iff, ϕ.map_pow, ϕ.map_one] exact fun h => hG (ϕ h) #align is_p_group.of_injective IsPGroup.of_injective theorem to_subgroup (H : Subgroup G) : IsPGroup p H := hG.of_injective H.subtype Subtype.coe_injective #align is_p_group.to_subgroup IsPGroup.to_subgroup theorem of_surjective {H : Type} [Group H] (ϕ : G → H) (hϕ : Function.Surjective ϕ) : IsPGroup p H := by refine fun h => Exists.elim (hϕ h) fun g hg => Exists.imp (fun k hk => ?_) (hG g) rw [← hg, ← ϕ.map_pow, hk, ϕ.map_one] #align is_p_group.of_surjective IsPGroup.of_surjective theorem to_quotient (H : Subgroup G) [H.Normal] : IsPGroup p (G ⧸ H) := hG.of_surjective (QuotientGroup.mk' H) Quotient.surjective_Quotient_mk'' #align is_p_group.to_quotient IsPGroup.to_quotient theorem of_equiv {H : Type} [Group H] (ϕ : G ≃ H) : IsPGroup p H := hG.of_surjective ϕ.toMonoidHom ϕ.surjective #align is_p_group.of_equiv IsPGroup.of_equiv theorem orderOf_coprime {n : ℕ} (hn : p.Coprime n) (g : G) : (orderOf g).Coprime n := let ⟨k, hk⟩ := hG g (hn.pow_left k).coprime_dvd_left (orderOf_dvd_of_pow_eq_one hk) #align is_p_group.order_of_coprime IsPGroup.orderOf_coprime noncomputable def powEquiv {n : ℕ} (hn : p.Coprime n) : G ≃ G := let h : ∀ g : G, (Nat.card (Subgroup.zpowers g)).Coprime n := fun g => (Nat.card_zpowers g).symm ▸ hG.orderOf_coprime hn g { toFun := (· ^ n) invFun := fun g => (powCoprime (h g)).symm ⟨g, Subgroup.mem_zpowers g⟩ left_inv := fun g => Subtype.ext_iff.1 <\| (powCoprime (h (g ^ n))).left_inv ⟨g, _, Subtype.ext_iff.1 <\| (powCoprime (h g)).left_inv ⟨g, Subgroup.mem_zpowers g⟩⟩ right_inv := fun g => Subtype.ext_iff.1 <\| (powCoprime (h g)).right_inv ⟨g, Subgroup.mem_zpowers g⟩ } #align is_p_group.pow_equiv IsPGroup.powEquiv @[simp] theorem powEquiv_apply {n : ℕ} (hn : p.Coprime n) (g : G) : hG.powEquiv hn g = g ^ n := rfl #align is_p_group.pow_equiv_apply IsPGroup.powEquiv_apply @[simp] theorem powEquiv_symm_apply {n : ℕ} (hn : p.Coprime n) (g : G) : (hG.powEquiv hn).symm g = g ^ (orderOf g).gcdB n := by rw [← Nat.card_zpowers]; rfl #align is_p_group.pow_equiv_symm_apply IsPGroup.powEquiv_symm_apply variable [hp : Fact p.Prime] noncomputable abbrev powEquiv' {n : ℕ} (hn : ¬p ∣ n) : G ≃ G := powEquiv hG (hp.out.coprime_iff_not_dvd.mpr hn) #align is_p_group.pow_equiv' IsPGroup.powEquiv' theorem index (H : Subgroup G) [H.FiniteIndex] : ∃ n : ℕ, H.index = p ^ n := by haveI := H.normalCore.fintypeQuotientOfFiniteIndex obtain ⟨n, hn⟩ := iff_card.mp (hG.to_quotient H.normalCore) obtain ⟨k, _, hk2⟩ := (Nat.dvd_prime_pow hp.out).mp ((congr_arg _ (H.normalCore.index_eq_card.trans hn)).mp (Subgroup.index_dvd_of_le H.normalCore_le)) exact ⟨k, hk2⟩ #align is_p_group.index IsPGroup.index theorem card_eq_or_dvd : Nat.card G = 1 ∨ p ∣ Nat.card G := by cases fintypeOrInfinite G · obtain ⟨n, hn⟩ := iff_card.mp hG rw [Nat.card_eq_fintype_card, hn] cases' n with n n · exact Or.inl rfl · exact Or.inr ⟨p ^ n, by rw [pow_succ']⟩ · rw [Nat.card_eq_zero_of_infinite] exact Or.inr ⟨0, rfl⟩ #align is_p_group.card_eq_or_dvd IsPGroup.card_eq_or_dvd theorem nontrivial_iff_card [Fintype G] : Nontrivial G ↔ ∃ n > 0, card G = p ^ n := ⟨fun hGnt => let ⟨k, hk⟩ := iff_card.1 hG ⟨k, Nat.pos_of_ne_zero fun hk0 => by rw [hk0, pow_zero] at hk; exact Fintype.one_lt_card.ne' hk, hk⟩, fun ⟨k, hk0, hk⟩ => one_lt_card_iff_nontrivial.1 <\| hk.symm ▸ one_lt_pow (Fact.out (p := p.Prime)).one_lt (ne_of_gt hk0)⟩ #align is_p_group.nontrivial_iff_card IsPGroup.nontrivial_iff_card variable {α : Type*} [MulAction G α] theorem card_orbit (a : α) [Fintype (orbit G a)] : ∃ n : ℕ, card (orbit G a) = p ^ n := by let ϕ := orbitEquivQuotientStabilizer G a haveI := Fintype.ofEquiv (orbit G a) ϕ haveI := (stabilizer G a).finiteIndex_of_finite_quotient rw [card_congr ϕ, ← Subgroup.index_eq_card] exact hG.index (stabilizer G a) #align is_p_group.card_orbit IsPGroup.card_orbit variable (α) [Fintype α] theorem card_modEq_card_fixedPoints [Fintype (fixedPoints G α)] : card α ≡ card (fixedPoints G α) [MOD p] := by classical calc card α = card (Σy : Quotient (orbitRel G α), { x // Quotient.mk'' x = y }) := card_congr (Equiv.sigmaFiberEquiv (@Quotient.mk'' _ (orbitRel G α))).symm _ = ∑ a : Quotient (orbitRel G α), card { x // Quotient.mk'' x = a } := card_sigma _ ≡ ∑ _a : fixedPoints G α, 1 [MOD p] := ?_ _ = _ := by simp rw [← ZMod.eq_iff_modEq_nat p, Nat.cast_sum, Nat.cast_sum] have key : ∀ x, card { y // (Quotient.mk'' y : Quotient (orbitRel G α)) = Quotient.mk'' x } = card (orbit G x) := fun x => by simp only [Quotient.eq'']; congr refine Eq.symm (Finset.sum_bij_ne_zero (fun a _ _ => Quotient.mk'' a.1) (fun _ _ _ => Finset.mem_univ _) (fun a₁ _ _ a₂ _ _ h => Subtype.eq (mem_fixedPoints'.mp a₂.2 a₁.1 (Quotient.exact' h))) (fun b => Quotient.inductionOn' b fun b _ hb => ?_) fun a ha _ => by rw [key, mem_fixedPoints_iff_card_orbit_eq_one.mp a.2]) obtain ⟨k, hk⟩ := hG.card_orbit b have : k = 0 := Nat.le_zero.1 (Nat.le_of_lt_succ (lt_of_not_ge (mt (pow_dvd_pow p) (by rwa [pow_one, ← hk, ← Nat.modEq_zero_iff_dvd, ← ZMod.eq_iff_modEq_nat, ← key, Nat.cast_zero])))) exact ⟨⟨b, mem_fixedPoints_iff_card_orbit_eq_one.2 <\| by rw [hk, this, pow_zero]⟩, Finset.mem_univ _, ne_of_eq_of_ne Nat.cast_one one_ne_zero, rfl⟩ #align is_p_group.card_modeq_card_fixed_points IsPGroup.card_modEq_card_fixedPoints theorem nonempty_fixed_point_of_prime_not_dvd_card (hpα : ¬p ∣ card α) [Finite (fixedPoints G α)] : (fixedPoints G α).Nonempty := @Set.nonempty_of_nonempty_subtype _ _ (by cases nonempty_fintype (fixedPoints G α) rw [← card_pos_iff, pos_iff_ne_zero] contrapose! hpα rw [← Nat.modEq_zero_iff_dvd, ← hpα] exact hG.card_modEq_card_fixedPoints α) #align is_p_group.nonempty_fixed_point_of_prime_not_dvd_card IsPGroup.nonempty_fixed_point_of_prime_not_dvd_card theorem exists_fixed_point_of_prime_dvd_card_of_fixed_point (hpα : p ∣ card α) {a : α} (ha : a ∈ fixedPoints G α) : ∃ b, b ∈ fixedPoints G α ∧ a ≠ b := by cases nonempty_fintype (fixedPoints G α) have hpf : p ∣ card (fixedPoints G α) := Nat.modEq_zero_iff_dvd.mp ((hG.card_modEq_card_fixedPoints α).symm.trans hpα.modEq_zero_nat) have hα : 1 < card (fixedPoints G α) := (Fact.out (p := p.Prime)).one_lt.trans_le (Nat.le_of_dvd (card_pos_iff.2 ⟨⟨a, ha⟩⟩) hpf) exact let ⟨⟨b, hb⟩, hba⟩ := exists_ne_of_one_lt_card hα ⟨a, ha⟩ ⟨b, hb, fun hab => hba (by simp_rw [hab])⟩ #align is_p_group.exists_fixed_point_of_prime_dvd_card_of_fixed_point IsPGroup.exists_fixed_point_of_prime_dvd_card_of_fixed_point theorem center_nontrivial [Nontrivial G] [Finite G] : Nontrivial (Subgroup.center G) := by classical cases nonempty_fintype G have := (hG.of_equiv ConjAct.toConjAct).exists_fixed_point_of_prime_dvd_card_of_fixed_point G rw [ConjAct.fixedPoints_eq_center] at this have dvd : p ∣ card G := by obtain ⟨n, hn0, hn⟩ := hG.nontrivial_iff_card.mp inferInstance exact hn.symm ▸ dvd_pow_self _ (ne_of_gt hn0) obtain ⟨g, hg⟩ := this dvd (Subgroup.center G).one_mem exact ⟨⟨1, ⟨g, hg.1⟩, mt Subtype.ext_iff.mp hg.2⟩⟩ #align is_p_group.center_nontrivial IsPGroup.center_nontrivial	Mathlib/GroupTheory/PGroup.lean	256	259	theorem bot_lt_center [Nontrivial G] [Finite G] : ⊥ < Subgroup.center G := by	haveI := center_nontrivial hG classical exact bot_lt_iff_ne_bot.mpr ((Subgroup.center G).one_lt_card_iff_ne_bot.mp Finite.one_lt_card)
import Mathlib.Data.List.Basic namespace List variable {α β : Type*} @[simp] theorem reduceOption_cons_of_some (x : α) (l : List (Option α)) : reduceOption (some x :: l) = x :: l.reduceOption := by simp only [reduceOption, filterMap, id, eq_self_iff_true, and_self_iff] #align list.reduce_option_cons_of_some List.reduceOption_cons_of_some @[simp] theorem reduceOption_cons_of_none (l : List (Option α)) : reduceOption (none :: l) = l.reduceOption := by simp only [reduceOption, filterMap, id] #align list.reduce_option_cons_of_none List.reduceOption_cons_of_none @[simp] theorem reduceOption_nil : @reduceOption α [] = [] := rfl #align list.reduce_option_nil List.reduceOption_nil @[simp] theorem reduceOption_map {l : List (Option α)} {f : α → β} : reduceOption (map (Option.map f) l) = map f (reduceOption l) := by induction' l with hd tl hl · simp only [reduceOption_nil, map_nil] · cases hd <;> simpa [true_and_iff, Option.map_some', map, eq_self_iff_true, reduceOption_cons_of_some] using hl #align list.reduce_option_map List.reduceOption_map theorem reduceOption_append (l l' : List (Option α)) : (l ++ l').reduceOption = l.reduceOption ++ l'.reduceOption := filterMap_append l l' id #align list.reduce_option_append List.reduceOption_append theorem reduceOption_length_eq {l : List (Option α)} : l.reduceOption.length = (l.filter Option.isSome).length := by induction' l with hd tl hl · simp_rw [reduceOption_nil, filter_nil, length] · cases hd <;> simp [hl] theorem length_eq_reduceOption_length_add_filter_none {l : List (Option α)} : l.length = l.reduceOption.length + (l.filter Option.isNone).length := by simp_rw [reduceOption_length_eq, l.length_eq_length_filter_add Option.isSome, Option.bnot_isSome] theorem reduceOption_length_le (l : List (Option α)) : l.reduceOption.length ≤ l.length := by rw [length_eq_reduceOption_length_add_filter_none] apply Nat.le_add_right #align list.reduce_option_length_le List.reduceOption_length_le	Mathlib/Data/List/ReduceOption.lean	64	66	theorem reduceOption_length_eq_iff {l : List (Option α)} : l.reduceOption.length = l.length ↔ ∀ x ∈ l, Option.isSome x := by	rw [reduceOption_length_eq, List.filter_length_eq_length]
import Mathlib.Analysis.SpecialFunctions.ImproperIntegrals import Mathlib.Analysis.Calculus.ParametricIntegral import Mathlib.MeasureTheory.Measure.Haar.NormedSpace #align_import analysis.mellin_transform from "leanprover-community/mathlib"@"917c3c072e487b3cccdbfeff17e75b40e45f66cb" open MeasureTheory Set Filter Asymptotics TopologicalSpace open Real open Complex hiding exp log abs_of_nonneg open scoped Topology noncomputable section section Defs variable {E : Type} [NormedAddCommGroup E] [NormedSpace ℂ E] def MellinConvergent (f : ℝ → E) (s : ℂ) : Prop := IntegrableOn (fun t : ℝ => (t : ℂ) ^ (s - 1) • f t) (Ioi 0) #align mellin_convergent MellinConvergent theorem MellinConvergent.const_smul {f : ℝ → E} {s : ℂ} (hf : MellinConvergent f s) {𝕜 : Type} [NontriviallyNormedField 𝕜] [NormedSpace 𝕜 E] [SMulCommClass ℂ 𝕜 E] (c : 𝕜) : MellinConvergent (fun t => c • f t) s := by simpa only [MellinConvergent, smul_comm] using hf.smul c #align mellin_convergent.const_smul MellinConvergent.const_smul theorem MellinConvergent.cpow_smul {f : ℝ → E} {s a : ℂ} : MellinConvergent (fun t => (t : ℂ) ^ a • f t) s ↔ MellinConvergent f (s + a) := by refine integrableOn_congr_fun (fun t ht => ?_) measurableSet_Ioi simp_rw [← sub_add_eq_add_sub, cpow_add _ _ (ofReal_ne_zero.2 <\| ne_of_gt ht), mul_smul] #align mellin_convergent.cpow_smul MellinConvergent.cpow_smul nonrec theorem MellinConvergent.div_const {f : ℝ → ℂ} {s : ℂ} (hf : MellinConvergent f s) (a : ℂ) : MellinConvergent (fun t => f t / a) s := by simpa only [MellinConvergent, smul_eq_mul, ← mul_div_assoc] using hf.div_const a #align mellin_convergent.div_const MellinConvergent.div_const theorem MellinConvergent.comp_mul_left {f : ℝ → E} {s : ℂ} {a : ℝ} (ha : 0 < a) : MellinConvergent (fun t => f (a * t)) s ↔ MellinConvergent f s := by have := integrableOn_Ioi_comp_mul_left_iff (fun t : ℝ => (t : ℂ) ^ (s - 1) • f t) 0 ha rw [mul_zero] at this have h1 : EqOn (fun t : ℝ => (↑(a * t) : ℂ) ^ (s - 1) • f (a * t)) ((a : ℂ) ^ (s - 1) • fun t : ℝ => (t : ℂ) ^ (s - 1) • f (a * t)) (Ioi 0) := fun t ht ↦ by simp only [ofReal_mul, mul_cpow_ofReal_nonneg ha.le (le_of_lt ht), mul_smul, Pi.smul_apply] have h2 : (a : ℂ) ^ (s - 1) ≠ 0 := by rw [Ne, cpow_eq_zero_iff, not_and_or, ofReal_eq_zero] exact Or.inl ha.ne' rw [MellinConvergent, MellinConvergent, ← this, integrableOn_congr_fun h1 measurableSet_Ioi, IntegrableOn, IntegrableOn, integrable_smul_iff h2] #align mellin_convergent.comp_mul_left MellinConvergent.comp_mul_left	Mathlib/Analysis/MellinTransform.lean	78	87	theorem MellinConvergent.comp_rpow {f : ℝ → E} {s : ℂ} {a : ℝ} (ha : a ≠ 0) : MellinConvergent (fun t => f (t ^ a)) s ↔ MellinConvergent f (s / a) := by	refine Iff.trans ?_ (integrableOn_Ioi_comp_rpow_iff' _ ha) rw [MellinConvergent] refine integrableOn_congr_fun (fun t ht => ?_) measurableSet_Ioi dsimp only [Pi.smul_apply] rw [← Complex.coe_smul (t ^ (a - 1)), ← mul_smul, ← cpow_mul_ofReal_nonneg (le_of_lt ht), ofReal_cpow (le_of_lt ht), ← cpow_add _ _ (ofReal_ne_zero.mpr (ne_of_gt ht)), ofReal_sub, ofReal_one, mul_sub, mul_div_cancel₀ _ (ofReal_ne_zero.mpr ha), mul_one, add_comm, ← add_sub_assoc, sub_add_cancel]
import Mathlib.Init.Order.Defs #align_import init.algebra.functions from "leanprover-community/lean"@"c2bcdbcbe741ed37c361a30d38e179182b989f76" universe u section open Decidable variable {α : Type u} [LinearOrder α] theorem min_def (a b : α) : min a b = if a ≤ b then a else b := by rw [LinearOrder.min_def a] #align min_def min_def	Mathlib/Init/Order/LinearOrder.lean	29	30	theorem max_def (a b : α) : max a b = if a ≤ b then b else a := by	rw [LinearOrder.max_def a]
import Mathlib.Data.List.Basic namespace List variable {α β : Type*} #align list.length_enum_from List.enumFrom_length #align list.length_enum List.enum_length @[simp] theorem get?_enumFrom : ∀ n (l : List α) m, get? (enumFrom n l) m = (get? l m).map fun a => (n + m, a) \| n, [], m => rfl \| n, a :: l, 0 => rfl \| n, a :: l, m + 1 => (get?_enumFrom (n + 1) l m).trans <\| by rw [Nat.add_right_comm]; rfl #align list.enum_from_nth List.get?_enumFrom @[deprecated (since := "2024-04-06")] alias enumFrom_get? := get?_enumFrom @[simp] theorem get?_enum (l : List α) (n) : get? (enum l) n = (get? l n).map fun a => (n, a) := by rw [enum, get?_enumFrom, Nat.zero_add] #align list.enum_nth List.get?_enum @[deprecated (since := "2024-04-06")] alias enum_get? := get?_enum @[simp] theorem enumFrom_map_snd : ∀ (n) (l : List α), map Prod.snd (enumFrom n l) = l \| _, [] => rfl \| _, _ :: _ => congr_arg (cons _) (enumFrom_map_snd _ _) #align list.enum_from_map_snd List.enumFrom_map_snd @[simp] theorem enum_map_snd (l : List α) : map Prod.snd (enum l) = l := enumFrom_map_snd _ _ #align list.enum_map_snd List.enum_map_snd @[simp] theorem get_enumFrom (l : List α) (n) (i : Fin (l.enumFrom n).length) : (l.enumFrom n).get i = (n + i, l.get (i.cast enumFrom_length)) := by simp [get_eq_get?] #align list.nth_le_enum_from List.get_enumFrom @[simp]	Mathlib/Data/List/Enum.lean	54	56	theorem get_enum (l : List α) (i : Fin l.enum.length) : l.enum.get i = (i.1, l.get (i.cast enum_length)) := by	simp [enum]
import Mathlib.Analysis.Calculus.Deriv.AffineMap import Mathlib.Analysis.Calculus.Deriv.Slope import Mathlib.Analysis.Calculus.Deriv.Mul import Mathlib.Analysis.Calculus.Deriv.Comp import Mathlib.Analysis.Calculus.LocalExtr.Rolle import Mathlib.Analysis.Convex.Normed import Mathlib.Analysis.RCLike.Basic #align_import analysis.calculus.mean_value from "leanprover-community/mathlib"@"3bce8d800a6f2b8f63fe1e588fd76a9ff4adcebe" variable {E : Type} [NormedAddCommGroup E] [NormedSpace ℝ E] {F : Type} [NormedAddCommGroup F] [NormedSpace ℝ F] open Metric Set Asymptotics ContinuousLinearMap Filter open scoped Classical Topology NNReal theorem image_le_of_liminf_slope_right_lt_deriv_boundary' {f f' : ℝ → ℝ} {a b : ℝ} (hf : ContinuousOn f (Icc a b)) -- `hf'` actually says `liminf (f z - f x) / (z - x) ≤ f' x` (hf' : ∀ x ∈ Ico a b, ∀ r, f' x < r → ∃ᶠ z in 𝓝[>] x, slope f x z < r) {B B' : ℝ → ℝ} (ha : f a ≤ B a) (hB : ContinuousOn B (Icc a b)) (hB' : ∀ x ∈ Ico a b, HasDerivWithinAt B (B' x) (Ici x) x) (bound : ∀ x ∈ Ico a b, f x = B x → f' x < B' x) : ∀ ⦃x⦄, x ∈ Icc a b → f x ≤ B x := by change Icc a b ⊆ { x \| f x ≤ B x } set s := { x \| f x ≤ B x } ∩ Icc a b have A : ContinuousOn (fun x => (f x, B x)) (Icc a b) := hf.prod hB have : IsClosed s := by simp only [s, inter_comm] exact A.preimage_isClosed_of_isClosed isClosed_Icc OrderClosedTopology.isClosed_le' apply this.Icc_subset_of_forall_exists_gt ha rintro x ⟨hxB : f x ≤ B x, xab⟩ y hy cases' hxB.lt_or_eq with hxB hxB · -- If `f x < B x`, then all we need is continuity of both sides refine nonempty_of_mem (inter_mem ?_ (Ioc_mem_nhdsWithin_Ioi ⟨le_rfl, hy⟩)) have : ∀ᶠ x in 𝓝[Icc a b] x, f x < B x := A x (Ico_subset_Icc_self xab) (IsOpen.mem_nhds (isOpen_lt continuous_fst continuous_snd) hxB) have : ∀ᶠ x in 𝓝[>] x, f x < B x := nhdsWithin_le_of_mem (Icc_mem_nhdsWithin_Ioi xab) this exact this.mono fun y => le_of_lt · rcases exists_between (bound x xab hxB) with ⟨r, hfr, hrB⟩ specialize hf' x xab r hfr have HB : ∀ᶠ z in 𝓝[>] x, r < slope B x z := (hasDerivWithinAt_iff_tendsto_slope' <\| lt_irrefl x).1 (hB' x xab).Ioi_of_Ici (Ioi_mem_nhds hrB) obtain ⟨z, hfz, hzB, hz⟩ : ∃ z, slope f x z < r ∧ r < slope B x z ∧ z ∈ Ioc x y := (hf'.and_eventually (HB.and (Ioc_mem_nhdsWithin_Ioi ⟨le_rfl, hy⟩))).exists refine ⟨z, ?_, hz⟩ have := (hfz.trans hzB).le rwa [slope_def_field, slope_def_field, div_le_div_right (sub_pos.2 hz.1), hxB, sub_le_sub_iff_right] at this #align image_le_of_liminf_slope_right_lt_deriv_boundary' image_le_of_liminf_slope_right_lt_deriv_boundary' theorem image_le_of_liminf_slope_right_lt_deriv_boundary {f f' : ℝ → ℝ} {a b : ℝ} (hf : ContinuousOn f (Icc a b)) -- `hf'` actually says `liminf (f z - f x) / (z - x) ≤ f' x` (hf' : ∀ x ∈ Ico a b, ∀ r, f' x < r → ∃ᶠ z in 𝓝[>] x, slope f x z < r) {B B' : ℝ → ℝ} (ha : f a ≤ B a) (hB : ∀ x, HasDerivAt B (B' x) x) (bound : ∀ x ∈ Ico a b, f x = B x → f' x < B' x) : ∀ ⦃x⦄, x ∈ Icc a b → f x ≤ B x := image_le_of_liminf_slope_right_lt_deriv_boundary' hf hf' ha (fun x _ => (hB x).continuousAt.continuousWithinAt) (fun x _ => (hB x).hasDerivWithinAt) bound #align image_le_of_liminf_slope_right_lt_deriv_boundary image_le_of_liminf_slope_right_lt_deriv_boundary theorem image_le_of_liminf_slope_right_le_deriv_boundary {f : ℝ → ℝ} {a b : ℝ} (hf : ContinuousOn f (Icc a b)) {B B' : ℝ → ℝ} (ha : f a ≤ B a) (hB : ContinuousOn B (Icc a b)) (hB' : ∀ x ∈ Ico a b, HasDerivWithinAt B (B' x) (Ici x) x) -- `bound` actually says `liminf (f z - f x) / (z - x) ≤ B' x` (bound : ∀ x ∈ Ico a b, ∀ r, B' x < r → ∃ᶠ z in 𝓝[>] x, slope f x z < r) : ∀ ⦃x⦄, x ∈ Icc a b → f x ≤ B x := by have Hr : ∀ x ∈ Icc a b, ∀ r > 0, f x ≤ B x + r * (x - a) := fun x hx r hr => by apply image_le_of_liminf_slope_right_lt_deriv_boundary' hf bound · rwa [sub_self, mul_zero, add_zero] · exact hB.add (continuousOn_const.mul (continuousOn_id.sub continuousOn_const)) · intro x hx exact (hB' x hx).add (((hasDerivWithinAt_id x (Ici x)).sub_const a).const_mul r) · intro x _ _ rw [mul_one] exact (lt_add_iff_pos_right _).2 hr exact hx intro x hx have : ContinuousWithinAt (fun r => B x + r * (x - a)) (Ioi 0) 0 := continuousWithinAt_const.add (continuousWithinAt_id.mul continuousWithinAt_const) convert continuousWithinAt_const.closure_le _ this (Hr x hx) using 1 <;> simp #align image_le_of_liminf_slope_right_le_deriv_boundary image_le_of_liminf_slope_right_le_deriv_boundary theorem image_le_of_deriv_right_lt_deriv_boundary' {f f' : ℝ → ℝ} {a b : ℝ} (hf : ContinuousOn f (Icc a b)) (hf' : ∀ x ∈ Ico a b, HasDerivWithinAt f (f' x) (Ici x) x) {B B' : ℝ → ℝ} (ha : f a ≤ B a) (hB : ContinuousOn B (Icc a b)) (hB' : ∀ x ∈ Ico a b, HasDerivWithinAt B (B' x) (Ici x) x) (bound : ∀ x ∈ Ico a b, f x = B x → f' x < B' x) : ∀ ⦃x⦄, x ∈ Icc a b → f x ≤ B x := image_le_of_liminf_slope_right_lt_deriv_boundary' hf (fun x hx _ hr => (hf' x hx).liminf_right_slope_le hr) ha hB hB' bound #align image_le_of_deriv_right_lt_deriv_boundary' image_le_of_deriv_right_lt_deriv_boundary' theorem image_le_of_deriv_right_lt_deriv_boundary {f f' : ℝ → ℝ} {a b : ℝ} (hf : ContinuousOn f (Icc a b)) (hf' : ∀ x ∈ Ico a b, HasDerivWithinAt f (f' x) (Ici x) x) {B B' : ℝ → ℝ} (ha : f a ≤ B a) (hB : ∀ x, HasDerivAt B (B' x) x) (bound : ∀ x ∈ Ico a b, f x = B x → f' x < B' x) : ∀ ⦃x⦄, x ∈ Icc a b → f x ≤ B x := image_le_of_deriv_right_lt_deriv_boundary' hf hf' ha (fun x _ => (hB x).continuousAt.continuousWithinAt) (fun x _ => (hB x).hasDerivWithinAt) bound #align image_le_of_deriv_right_lt_deriv_boundary image_le_of_deriv_right_lt_deriv_boundary theorem image_le_of_deriv_right_le_deriv_boundary {f f' : ℝ → ℝ} {a b : ℝ} (hf : ContinuousOn f (Icc a b)) (hf' : ∀ x ∈ Ico a b, HasDerivWithinAt f (f' x) (Ici x) x) {B B' : ℝ → ℝ} (ha : f a ≤ B a) (hB : ContinuousOn B (Icc a b)) (hB' : ∀ x ∈ Ico a b, HasDerivWithinAt B (B' x) (Ici x) x) (bound : ∀ x ∈ Ico a b, f' x ≤ B' x) : ∀ ⦃x⦄, x ∈ Icc a b → f x ≤ B x := image_le_of_liminf_slope_right_le_deriv_boundary hf ha hB hB' fun x hx _ hr => (hf' x hx).liminf_right_slope_le (lt_of_le_of_lt (bound x hx) hr) #align image_le_of_deriv_right_le_deriv_boundary image_le_of_deriv_right_le_deriv_boundary section variable {f : ℝ → E} {a b : ℝ} theorem image_norm_le_of_liminf_right_slope_norm_lt_deriv_boundary {E : Type} [NormedAddCommGroup E] {f : ℝ → E} {f' : ℝ → ℝ} (hf : ContinuousOn f (Icc a b)) -- `hf'` actually says `liminf (‖f z‖ - ‖f x‖) / (z - x) ≤ f' x` (hf' : ∀ x ∈ Ico a b, ∀ r, f' x < r → ∃ᶠ z in 𝓝[>] x, slope (norm ∘ f) x z < r) {B B' : ℝ → ℝ} (ha : ‖f a‖ ≤ B a) (hB : ContinuousOn B (Icc a b)) (hB' : ∀ x ∈ Ico a b, HasDerivWithinAt B (B' x) (Ici x) x) (bound : ∀ x ∈ Ico a b, ‖f x‖ = B x → f' x < B' x) : ∀ ⦃x⦄, x ∈ Icc a b → ‖f x‖ ≤ B x := image_le_of_liminf_slope_right_lt_deriv_boundary' (continuous_norm.comp_continuousOn hf) hf' ha hB hB' bound #align image_norm_le_of_liminf_right_slope_norm_lt_deriv_boundary image_norm_le_of_liminf_right_slope_norm_lt_deriv_boundary theorem image_norm_le_of_norm_deriv_right_lt_deriv_boundary' {f' : ℝ → E} (hf : ContinuousOn f (Icc a b)) (hf' : ∀ x ∈ Ico a b, HasDerivWithinAt f (f' x) (Ici x) x) {B B' : ℝ → ℝ} (ha : ‖f a‖ ≤ B a) (hB : ContinuousOn B (Icc a b)) (hB' : ∀ x ∈ Ico a b, HasDerivWithinAt B (B' x) (Ici x) x) (bound : ∀ x ∈ Ico a b, ‖f x‖ = B x → ‖f' x‖ < B' x) : ∀ ⦃x⦄, x ∈ Icc a b → ‖f x‖ ≤ B x := image_norm_le_of_liminf_right_slope_norm_lt_deriv_boundary hf (fun x hx _ hr => (hf' x hx).liminf_right_slope_norm_le hr) ha hB hB' bound #align image_norm_le_of_norm_deriv_right_lt_deriv_boundary' image_norm_le_of_norm_deriv_right_lt_deriv_boundary' theorem image_norm_le_of_norm_deriv_right_lt_deriv_boundary {f' : ℝ → E} (hf : ContinuousOn f (Icc a b)) (hf' : ∀ x ∈ Ico a b, HasDerivWithinAt f (f' x) (Ici x) x) {B B' : ℝ → ℝ} (ha : ‖f a‖ ≤ B a) (hB : ∀ x, HasDerivAt B (B' x) x) (bound : ∀ x ∈ Ico a b, ‖f x‖ = B x → ‖f' x‖ < B' x) : ∀ ⦃x⦄, x ∈ Icc a b → ‖f x‖ ≤ B x := image_norm_le_of_norm_deriv_right_lt_deriv_boundary' hf hf' ha (fun x _ => (hB x).continuousAt.continuousWithinAt) (fun x _ => (hB x).hasDerivWithinAt) bound #align image_norm_le_of_norm_deriv_right_lt_deriv_boundary image_norm_le_of_norm_deriv_right_lt_deriv_boundary theorem image_norm_le_of_norm_deriv_right_le_deriv_boundary' {f' : ℝ → E} (hf : ContinuousOn f (Icc a b)) (hf' : ∀ x ∈ Ico a b, HasDerivWithinAt f (f' x) (Ici x) x) {B B' : ℝ → ℝ} (ha : ‖f a‖ ≤ B a) (hB : ContinuousOn B (Icc a b)) (hB' : ∀ x ∈ Ico a b, HasDerivWithinAt B (B' x) (Ici x) x) (bound : ∀ x ∈ Ico a b, ‖f' x‖ ≤ B' x) : ∀ ⦃x⦄, x ∈ Icc a b → ‖f x‖ ≤ B x := image_le_of_liminf_slope_right_le_deriv_boundary (continuous_norm.comp_continuousOn hf) ha hB hB' fun x hx _ hr => (hf' x hx).liminf_right_slope_norm_le ((bound x hx).trans_lt hr) #align image_norm_le_of_norm_deriv_right_le_deriv_boundary' image_norm_le_of_norm_deriv_right_le_deriv_boundary' theorem image_norm_le_of_norm_deriv_right_le_deriv_boundary {f' : ℝ → E} (hf : ContinuousOn f (Icc a b)) (hf' : ∀ x ∈ Ico a b, HasDerivWithinAt f (f' x) (Ici x) x) {B B' : ℝ → ℝ} (ha : ‖f a‖ ≤ B a) (hB : ∀ x, HasDerivAt B (B' x) x) (bound : ∀ x ∈ Ico a b, ‖f' x‖ ≤ B' x) : ∀ ⦃x⦄, x ∈ Icc a b → ‖f x‖ ≤ B x := image_norm_le_of_norm_deriv_right_le_deriv_boundary' hf hf' ha (fun x _ => (hB x).continuousAt.continuousWithinAt) (fun x _ => (hB x).hasDerivWithinAt) bound #align image_norm_le_of_norm_deriv_right_le_deriv_boundary image_norm_le_of_norm_deriv_right_le_deriv_boundary theorem norm_image_sub_le_of_norm_deriv_right_le_segment {f' : ℝ → E} {C : ℝ} (hf : ContinuousOn f (Icc a b)) (hf' : ∀ x ∈ Ico a b, HasDerivWithinAt f (f' x) (Ici x) x) (bound : ∀ x ∈ Ico a b, ‖f' x‖ ≤ C) : ∀ x ∈ Icc a b, ‖f x - f a‖ ≤ C (x - a) := by let g x := f x - f a have hg : ContinuousOn g (Icc a b) := hf.sub continuousOn_const have hg' : ∀ x ∈ Ico a b, HasDerivWithinAt g (f' x) (Ici x) x := by intro x hx simpa using (hf' x hx).sub (hasDerivWithinAt_const _ _ _) let B x := C * (x - a) have hB : ∀ x, HasDerivAt B C x := by intro x simpa using (hasDerivAt_const x C).mul ((hasDerivAt_id x).sub (hasDerivAt_const x a)) convert image_norm_le_of_norm_deriv_right_le_deriv_boundary hg hg' _ hB bound simp only [g, B]; rw [sub_self, norm_zero, sub_self, mul_zero] #align norm_image_sub_le_of_norm_deriv_right_le_segment norm_image_sub_le_of_norm_deriv_right_le_segment theorem norm_image_sub_le_of_norm_deriv_le_segment' {f' : ℝ → E} {C : ℝ} (hf : ∀ x ∈ Icc a b, HasDerivWithinAt f (f' x) (Icc a b) x) (bound : ∀ x ∈ Ico a b, ‖f' x‖ ≤ C) : ∀ x ∈ Icc a b, ‖f x - f a‖ ≤ C * (x - a) := by refine norm_image_sub_le_of_norm_deriv_right_le_segment (fun x hx => (hf x hx).continuousWithinAt) (fun x hx => ?_) bound exact (hf x <\| Ico_subset_Icc_self hx).mono_of_mem (Icc_mem_nhdsWithin_Ici hx) #align norm_image_sub_le_of_norm_deriv_le_segment' norm_image_sub_le_of_norm_deriv_le_segment' theorem norm_image_sub_le_of_norm_deriv_le_segment {C : ℝ} (hf : DifferentiableOn ℝ f (Icc a b)) (bound : ∀ x ∈ Ico a b, ‖derivWithin f (Icc a b) x‖ ≤ C) : ∀ x ∈ Icc a b, ‖f x - f a‖ ≤ C * (x - a) := by refine norm_image_sub_le_of_norm_deriv_le_segment' ?_ bound exact fun x hx => (hf x hx).hasDerivWithinAt #align norm_image_sub_le_of_norm_deriv_le_segment norm_image_sub_le_of_norm_deriv_le_segment theorem norm_image_sub_le_of_norm_deriv_le_segment_01' {f' : ℝ → E} {C : ℝ} (hf : ∀ x ∈ Icc (0 : ℝ) 1, HasDerivWithinAt f (f' x) (Icc (0 : ℝ) 1) x) (bound : ∀ x ∈ Ico (0 : ℝ) 1, ‖f' x‖ ≤ C) : ‖f 1 - f 0‖ ≤ C := by simpa only [sub_zero, mul_one] using norm_image_sub_le_of_norm_deriv_le_segment' hf bound 1 (right_mem_Icc.2 zero_le_one) #align norm_image_sub_le_of_norm_deriv_le_segment_01' norm_image_sub_le_of_norm_deriv_le_segment_01' theorem norm_image_sub_le_of_norm_deriv_le_segment_01 {C : ℝ} (hf : DifferentiableOn ℝ f (Icc (0 : ℝ) 1)) (bound : ∀ x ∈ Ico (0 : ℝ) 1, ‖derivWithin f (Icc (0 : ℝ) 1) x‖ ≤ C) : ‖f 1 - f 0‖ ≤ C := by simpa only [sub_zero, mul_one] using norm_image_sub_le_of_norm_deriv_le_segment hf bound 1 (right_mem_Icc.2 zero_le_one) #align norm_image_sub_le_of_norm_deriv_le_segment_01 norm_image_sub_le_of_norm_deriv_le_segment_01 theorem constant_of_has_deriv_right_zero (hcont : ContinuousOn f (Icc a b)) (hderiv : ∀ x ∈ Ico a b, HasDerivWithinAt f 0 (Ici x) x) : ∀ x ∈ Icc a b, f x = f a := by have : ∀ x ∈ Icc a b, ‖f x - f a‖ ≤ 0 * (x - a) := fun x hx => norm_image_sub_le_of_norm_deriv_right_le_segment hcont hderiv (fun _ _ => norm_zero.le) x hx simpa only [zero_mul, norm_le_zero_iff, sub_eq_zero] using this #align constant_of_has_deriv_right_zero constant_of_has_deriv_right_zero theorem constant_of_derivWithin_zero (hdiff : DifferentiableOn ℝ f (Icc a b)) (hderiv : ∀ x ∈ Ico a b, derivWithin f (Icc a b) x = 0) : ∀ x ∈ Icc a b, f x = f a := by have H : ∀ x ∈ Ico a b, ‖derivWithin f (Icc a b) x‖ ≤ 0 := by simpa only [norm_le_zero_iff] using fun x hx => hderiv x hx simpa only [zero_mul, norm_le_zero_iff, sub_eq_zero] using fun x hx => norm_image_sub_le_of_norm_deriv_le_segment hdiff H x hx #align constant_of_deriv_within_zero constant_of_derivWithin_zero variable {f' g : ℝ → E} theorem eq_of_has_deriv_right_eq (derivf : ∀ x ∈ Ico a b, HasDerivWithinAt f (f' x) (Ici x) x) (derivg : ∀ x ∈ Ico a b, HasDerivWithinAt g (f' x) (Ici x) x) (fcont : ContinuousOn f (Icc a b)) (gcont : ContinuousOn g (Icc a b)) (hi : f a = g a) : ∀ y ∈ Icc a b, f y = g y := by simp only [← @sub_eq_zero _ _ (f _)] at hi ⊢ exact hi ▸ constant_of_has_deriv_right_zero (fcont.sub gcont) fun y hy => by simpa only [sub_self] using (derivf y hy).sub (derivg y hy) #align eq_of_has_deriv_right_eq eq_of_has_deriv_right_eq theorem eq_of_derivWithin_eq (fdiff : DifferentiableOn ℝ f (Icc a b)) (gdiff : DifferentiableOn ℝ g (Icc a b)) (hderiv : EqOn (derivWithin f (Icc a b)) (derivWithin g (Icc a b)) (Ico a b)) (hi : f a = g a) : ∀ y ∈ Icc a b, f y = g y := by have A : ∀ y ∈ Ico a b, HasDerivWithinAt f (derivWithin f (Icc a b) y) (Ici y) y := fun y hy => (fdiff y (mem_Icc_of_Ico hy)).hasDerivWithinAt.mono_of_mem (Icc_mem_nhdsWithin_Ici hy) have B : ∀ y ∈ Ico a b, HasDerivWithinAt g (derivWithin g (Icc a b) y) (Ici y) y := fun y hy => (gdiff y (mem_Icc_of_Ico hy)).hasDerivWithinAt.mono_of_mem (Icc_mem_nhdsWithin_Ici hy) exact eq_of_has_deriv_right_eq A (fun y hy => (hderiv hy).symm ▸ B y hy) fdiff.continuousOn gdiff.continuousOn hi #align eq_of_deriv_within_eq eq_of_derivWithin_eq end section variable {𝕜 G : Type} [RCLike 𝕜] [NormedSpace 𝕜 E] [NormedAddCommGroup G] [NormedSpace 𝕜 G] namespace Convex variable {f g : E → G} {C : ℝ} {s : Set E} {x y : E} {f' g' : E → E →L[𝕜] G} {φ : E →L[𝕜] G} theorem norm_image_sub_le_of_norm_hasFDerivWithin_le (hf : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (bound : ∀ x ∈ s, ‖f' x‖ ≤ C) (hs : Convex ℝ s) (xs : x ∈ s) (ys : y ∈ s) : ‖f y - f x‖ ≤ C ‖y - x‖ := by letI : NormedSpace ℝ G := RestrictScalars.normedSpace ℝ 𝕜 G set g := (AffineMap.lineMap x y : ℝ → E) have segm : MapsTo g (Icc 0 1 : Set ℝ) s := hs.mapsTo_lineMap xs ys have hD : ∀ t ∈ Icc (0 : ℝ) 1, HasDerivWithinAt (f ∘ g) (f' (g t) (y - x)) (Icc 0 1) t := fun t ht => by simpa using ((hf (g t) (segm ht)).restrictScalars ℝ).comp_hasDerivWithinAt _ AffineMap.hasDerivWithinAt_lineMap segm have bound : ∀ t ∈ Ico (0 : ℝ) 1, ‖f' (g t) (y - x)‖ ≤ C * ‖y - x‖ := fun t ht => le_of_opNorm_le _ (bound _ <\| segm <\| Ico_subset_Icc_self ht) _ simpa [g] using norm_image_sub_le_of_norm_deriv_le_segment_01' hD bound #align convex.norm_image_sub_le_of_norm_has_fderiv_within_le Convex.norm_image_sub_le_of_norm_hasFDerivWithin_le theorem lipschitzOnWith_of_nnnorm_hasFDerivWithin_le {C : ℝ≥0} (hf : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (bound : ∀ x ∈ s, ‖f' x‖₊ ≤ C) (hs : Convex ℝ s) : LipschitzOnWith C f s := by rw [lipschitzOnWith_iff_norm_sub_le] intro x x_in y y_in exact hs.norm_image_sub_le_of_norm_hasFDerivWithin_le hf bound y_in x_in #align convex.lipschitz_on_with_of_nnnorm_has_fderiv_within_le Convex.lipschitzOnWith_of_nnnorm_hasFDerivWithin_le	Mathlib/Analysis/Calculus/MeanValue.lean	491	502	theorem exists_nhdsWithin_lipschitzOnWith_of_hasFDerivWithinAt_of_nnnorm_lt (hs : Convex ℝ s) {f : E → G} (hder : ∀ᶠ y in 𝓝[s] x, HasFDerivWithinAt f (f' y) s y) (hcont : ContinuousWithinAt f' s x) (K : ℝ≥0) (hK : ‖f' x‖₊ < K) : ∃ t ∈ 𝓝[s] x, LipschitzOnWith K f t := by	obtain ⟨ε, ε0, hε⟩ : ∃ ε > 0, ball x ε ∩ s ⊆ { y \| HasFDerivWithinAt f (f' y) s y ∧ ‖f' y‖₊ < K } := mem_nhdsWithin_iff.1 (hder.and <\| hcont.nnnorm.eventually (gt_mem_nhds hK)) rw [inter_comm] at hε refine ⟨s ∩ ball x ε, inter_mem_nhdsWithin _ (ball_mem_nhds _ ε0), ?_⟩ exact (hs.inter (convex_ball _ _)).lipschitzOnWith_of_nnnorm_hasFDerivWithin_le (fun y hy => (hε hy).1.mono inter_subset_left) fun y hy => (hε hy).2.le
import Mathlib.LinearAlgebra.TensorProduct.Graded.External import Mathlib.RingTheory.GradedAlgebra.Basic import Mathlib.GroupTheory.GroupAction.Ring suppress_compilation open scoped TensorProduct variable {R ι A B : Type} variable [CommSemiring ι] [Module ι (Additive ℤˣ)] [DecidableEq ι] variable [CommRing R] [Ring A] [Ring B] [Algebra R A] [Algebra R B] variable (𝒜 : ι → Submodule R A) (ℬ : ι → Submodule R B) variable [GradedAlgebra 𝒜] [GradedAlgebra ℬ] open DirectSum variable (R) in @[nolint unusedArguments] def GradedTensorProduct (𝒜 : ι → Submodule R A) (ℬ : ι → Submodule R B) [GradedAlgebra 𝒜] [GradedAlgebra ℬ] : Type _ := A ⊗[R] B namespace GradedTensorProduct open TensorProduct @[inherit_doc GradedTensorProduct] scoped[TensorProduct] notation:100 𝒜 " ᵍ⊗[" R "] " ℬ:100 => GradedTensorProduct R 𝒜 ℬ instance instAddCommGroupWithOne : AddCommGroupWithOne (𝒜 ᵍ⊗[R] ℬ) := Algebra.TensorProduct.instAddCommGroupWithOne instance : Module R (𝒜 ᵍ⊗[R] ℬ) := TensorProduct.leftModule variable (R) in def of : A ⊗[R] B ≃ₗ[R] 𝒜 ᵍ⊗[R] ℬ := LinearEquiv.refl _ _ @[simp] theorem of_one : of R 𝒜 ℬ 1 = 1 := rfl @[simp] theorem of_symm_one : (of R 𝒜 ℬ).symm 1 = 1 := rfl -- for dsimp @[simp, nolint simpNF] theorem of_symm_of (x : A ⊗[R] B) : (of R 𝒜 ℬ).symm (of R 𝒜 ℬ x) = x := rfl -- for dsimp @[simp, nolint simpNF] theorem symm_of_of (x : 𝒜 ᵍ⊗[R] ℬ) : of R 𝒜 ℬ ((of R 𝒜 ℬ).symm x) = x := rfl @[ext] theorem hom_ext {M} [AddCommMonoid M] [Module R M] ⦃f g : 𝒜 ᵍ⊗[R] ℬ →ₗ[R] M⦄ (h : f ∘ₗ of R 𝒜 ℬ = (g ∘ₗ of R 𝒜 ℬ : A ⊗[R] B →ₗ[R] M)) : f = g := h variable (R) {𝒜 ℬ} in abbrev tmul (a : A) (b : B) : 𝒜 ᵍ⊗[R] ℬ := of R 𝒜 ℬ (a ⊗ₜ b) @[inherit_doc] notation:100 x " ᵍ⊗ₜ" y:100 => tmul _ x y @[inherit_doc] notation:100 x " ᵍ⊗ₜ[" R "] " y:100 => tmul R x y variable (R) in noncomputable def auxEquiv : (𝒜 ᵍ⊗[R] ℬ) ≃ₗ[R] (⨁ i, 𝒜 i) ⊗[R] (⨁ i, ℬ i) := let fA := (decomposeAlgEquiv 𝒜).toLinearEquiv let fB := (decomposeAlgEquiv ℬ).toLinearEquiv (of R 𝒜 ℬ).symm.trans (TensorProduct.congr fA fB) theorem auxEquiv_tmul (a : A) (b : B) : auxEquiv R 𝒜 ℬ (a ᵍ⊗ₜ b) = decompose 𝒜 a ⊗ₜ decompose ℬ b := rfl theorem auxEquiv_one : auxEquiv R 𝒜 ℬ 1 = 1 := by rw [← of_one, Algebra.TensorProduct.one_def, auxEquiv_tmul 𝒜 ℬ, DirectSum.decompose_one, DirectSum.decompose_one, Algebra.TensorProduct.one_def] theorem auxEquiv_symm_one : (auxEquiv R 𝒜 ℬ).symm 1 = 1 := (LinearEquiv.symm_apply_eq _).mpr (auxEquiv_one _ _).symm noncomputable def mulHom : (𝒜 ᵍ⊗[R] ℬ) →ₗ[R] (𝒜 ᵍ⊗[R] ℬ) →ₗ[R] (𝒜 ᵍ⊗[R] ℬ) := by letI fAB1 := auxEquiv R 𝒜 ℬ have := ((gradedMul R (𝒜 ·) (ℬ ·)).compl₁₂ fAB1.toLinearMap fAB1.toLinearMap).compr₂ fAB1.symm.toLinearMap exact this theorem mulHom_apply (x y : 𝒜 ᵍ⊗[R] ℬ) : mulHom 𝒜 ℬ x y = (auxEquiv R 𝒜 ℬ).symm (gradedMul R (𝒜 ·) (ℬ ·) (auxEquiv R 𝒜 ℬ x) (auxEquiv R 𝒜 ℬ y)) := rfl instance : Mul (𝒜 ᵍ⊗[R] ℬ) where mul x y := mulHom 𝒜 ℬ x y theorem mul_def (x y : 𝒜 ᵍ⊗[R] ℬ) : x y = mulHom 𝒜 ℬ x y := rfl -- Before #8386 this was `@[simp]` but it times out when we try to apply it. theorem auxEquiv_mul (x y : 𝒜 ᵍ⊗[R] ℬ) : auxEquiv R 𝒜 ℬ (x * y) = gradedMul R (𝒜 ·) (ℬ ·) (auxEquiv R 𝒜 ℬ x) (auxEquiv R 𝒜 ℬ y) := LinearEquiv.eq_symm_apply _ \|>.mp rfl instance instMonoid : Monoid (𝒜 ᵍ⊗[R] ℬ) where mul_one x := by rw [mul_def, mulHom_apply, auxEquiv_one, gradedMul_one, LinearEquiv.symm_apply_apply] one_mul x := by rw [mul_def, mulHom_apply, auxEquiv_one, one_gradedMul, LinearEquiv.symm_apply_apply] mul_assoc x y z := by simp_rw [mul_def, mulHom_apply, LinearEquiv.apply_symm_apply] rw [gradedMul_assoc] instance instRing : Ring (𝒜 ᵍ⊗[R] ℬ) where __ := instAddCommGroupWithOne 𝒜 ℬ __ := instMonoid 𝒜 ℬ right_distrib x y z := by simp_rw [mul_def, LinearMap.map_add₂] left_distrib x y z := by simp_rw [mul_def, map_add] mul_zero x := by simp_rw [mul_def, map_zero] zero_mul x := by simp_rw [mul_def, LinearMap.map_zero₂] theorem tmul_coe_mul_coe_tmul {j₁ i₂ : ι} (a₁ : A) (b₁ : ℬ j₁) (a₂ : 𝒜 i₂) (b₂ : B) : (a₁ ᵍ⊗ₜ[R] (b₁ : B) * (a₂ : A) ᵍ⊗ₜ[R] b₂ : 𝒜 ᵍ⊗[R] ℬ) = (-1 : ℤˣ)^(j₁ * i₂) • ((a₁ * a₂ : A) ᵍ⊗ₜ (b₁ * b₂ : B)) := by dsimp only [mul_def, mulHom_apply, of_symm_of] dsimp [auxEquiv, tmul] erw [decompose_coe, decompose_coe] simp_rw [← lof_eq_of R] rw [tmul_of_gradedMul_of_tmul] simp_rw [lof_eq_of R] rw [LinearEquiv.symm_symm] -- Note: #8386 had to specialize `map_smul` to `LinearEquiv.map_smul` rw [@Units.smul_def _ _ (_) (_), zsmul_eq_smul_cast R, LinearEquiv.map_smul, map_smul, ← zsmul_eq_smul_cast R, ← @Units.smul_def _ _ (_) (_)] rw [congr_symm_tmul] dsimp simp_rw [decompose_symm_mul, decompose_symm_of, Equiv.symm_apply_apply] theorem tmul_zero_coe_mul_coe_tmul {i₂ : ι} (a₁ : A) (b₁ : ℬ 0) (a₂ : 𝒜 i₂) (b₂ : B) : (a₁ ᵍ⊗ₜ[R] (b₁ : B) * (a₂ : A) ᵍ⊗ₜ[R] b₂ : 𝒜 ᵍ⊗[R] ℬ) = ((a₁ * a₂ : A) ᵍ⊗ₜ (b₁ * b₂ : B)) := by rw [tmul_coe_mul_coe_tmul, zero_mul, uzpow_zero, one_smul] theorem tmul_coe_mul_zero_coe_tmul {j₁ : ι} (a₁ : A) (b₁ : ℬ j₁) (a₂ : 𝒜 0) (b₂ : B) : (a₁ ᵍ⊗ₜ[R] (b₁ : B) * (a₂ : A) ᵍ⊗ₜ[R] b₂ : 𝒜 ᵍ⊗[R] ℬ) = ((a₁ * a₂ : A) ᵍ⊗ₜ (b₁ * b₂ : B)) := by rw [tmul_coe_mul_coe_tmul, mul_zero, uzpow_zero, one_smul] theorem tmul_one_mul_coe_tmul {i₂ : ι} (a₁ : A) (a₂ : 𝒜 i₂) (b₂ : B) : (a₁ ᵍ⊗ₜ[R] (1 : B) * (a₂ : A) ᵍ⊗ₜ[R] b₂ : 𝒜 ᵍ⊗[R] ℬ) = (a₁ * a₂ : A) ᵍ⊗ₜ (b₂ : B) := by convert tmul_zero_coe_mul_coe_tmul 𝒜 ℬ a₁ (@GradedMonoid.GOne.one _ (ℬ ·) _ _) a₂ b₂ rw [SetLike.coe_gOne, one_mul]	Mathlib/LinearAlgebra/TensorProduct/Graded/Internal.lean	217	220	theorem tmul_coe_mul_one_tmul {j₁ : ι} (a₁ : A) (b₁ : ℬ j₁) (b₂ : B) : (a₁ ᵍ⊗ₜ[R] (b₁ : B) * (1 : A) ᵍ⊗ₜ[R] b₂ : 𝒜 ᵍ⊗[R] ℬ) = (a₁ : A) ᵍ⊗ₜ (b₁ * b₂ : B) := by	convert tmul_coe_mul_zero_coe_tmul 𝒜 ℬ a₁ b₁ (@GradedMonoid.GOne.one _ (𝒜 ·) _ _) b₂ rw [SetLike.coe_gOne, mul_one]
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	Mathlib/Algebra/Module/Submodule/Bilinear.lean	140	143	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
import Mathlib.RingTheory.IntegralClosure import Mathlib.RingTheory.FractionalIdeal.Basic #align_import ring_theory.fractional_ideal from "leanprover-community/mathlib"@"ed90a7d327c3a5caf65a6faf7e8a0d63c4605df7" open IsLocalization Pointwise nonZeroDivisors namespace FractionalIdeal open Set Submodule variable {R : Type} [CommRing R] {S : Submonoid R} {P : Type} [CommRing P] variable [Algebra R P] [loc : IsLocalization S P] section variable {P' : Type} [CommRing P'] [Algebra R P'] [loc' : IsLocalization S P'] variable {P'' : Type} [CommRing P''] [Algebra R P''] [loc'' : IsLocalization S P''] theorem _root_.IsFractional.map (g : P →ₐ[R] P') {I : Submodule R P} : IsFractional S I → IsFractional S (Submodule.map g.toLinearMap I) \| ⟨a, a_nonzero, hI⟩ => ⟨a, a_nonzero, fun b hb => by obtain ⟨b', b'_mem, hb'⟩ := Submodule.mem_map.mp hb rw [AlgHom.toLinearMap_apply] at hb' obtain ⟨x, hx⟩ := hI b' b'_mem use x rw [← g.commutes, hx, g.map_smul, hb']⟩ #align is_fractional.map IsFractional.map def map (g : P →ₐ[R] P') : FractionalIdeal S P → FractionalIdeal S P' := fun I => ⟨Submodule.map g.toLinearMap I, I.isFractional.map g⟩ #align fractional_ideal.map FractionalIdeal.map @[simp, norm_cast] theorem coe_map (g : P →ₐ[R] P') (I : FractionalIdeal S P) : ↑(map g I) = Submodule.map g.toLinearMap I := rfl #align fractional_ideal.coe_map FractionalIdeal.coe_map @[simp] theorem mem_map {I : FractionalIdeal S P} {g : P →ₐ[R] P'} {y : P'} : y ∈ I.map g ↔ ∃ x, x ∈ I ∧ g x = y := Submodule.mem_map #align fractional_ideal.mem_map FractionalIdeal.mem_map variable (I J : FractionalIdeal S P) (g : P →ₐ[R] P') @[simp] theorem map_id : I.map (AlgHom.id _ _) = I := coeToSubmodule_injective (Submodule.map_id (I : Submodule R P)) #align fractional_ideal.map_id FractionalIdeal.map_id @[simp] theorem map_comp (g' : P' →ₐ[R] P'') : I.map (g'.comp g) = (I.map g).map g' := coeToSubmodule_injective (Submodule.map_comp g.toLinearMap g'.toLinearMap I) #align fractional_ideal.map_comp FractionalIdeal.map_comp @[simp, norm_cast] theorem map_coeIdeal (I : Ideal R) : (I : FractionalIdeal S P).map g = I := by ext x simp only [mem_coeIdeal] constructor · rintro ⟨_, ⟨y, hy, rfl⟩, rfl⟩ exact ⟨y, hy, (g.commutes y).symm⟩ · rintro ⟨y, hy, rfl⟩ exact ⟨_, ⟨y, hy, rfl⟩, g.commutes y⟩ #align fractional_ideal.map_coe_ideal FractionalIdeal.map_coeIdeal @[simp] theorem map_one : (1 : FractionalIdeal S P).map g = 1 := map_coeIdeal g ⊤ #align fractional_ideal.map_one FractionalIdeal.map_one @[simp] theorem map_zero : (0 : FractionalIdeal S P).map g = 0 := map_coeIdeal g 0 #align fractional_ideal.map_zero FractionalIdeal.map_zero @[simp] theorem map_add : (I + J).map g = I.map g + J.map g := coeToSubmodule_injective (Submodule.map_sup _ _ _) #align fractional_ideal.map_add FractionalIdeal.map_add @[simp] theorem map_mul : (I * J).map g = I.map g * J.map g := by simp only [mul_def] exact coeToSubmodule_injective (Submodule.map_mul _ _ _) #align fractional_ideal.map_mul FractionalIdeal.map_mul @[simp] theorem map_map_symm (g : P ≃ₐ[R] P') : (I.map (g : P →ₐ[R] P')).map (g.symm : P' →ₐ[R] P) = I := by rw [← map_comp, g.symm_comp, map_id] #align fractional_ideal.map_map_symm FractionalIdeal.map_map_symm @[simp] theorem map_symm_map (I : FractionalIdeal S P') (g : P ≃ₐ[R] P') : (I.map (g.symm : P' →ₐ[R] P)).map (g : P →ₐ[R] P') = I := by rw [← map_comp, g.comp_symm, map_id] #align fractional_ideal.map_symm_map FractionalIdeal.map_symm_map theorem map_mem_map {f : P →ₐ[R] P'} (h : Function.Injective f) {x : P} {I : FractionalIdeal S P} : f x ∈ map f I ↔ x ∈ I := mem_map.trans ⟨fun ⟨_, hx', x'_eq⟩ => h x'_eq ▸ hx', fun h => ⟨x, h, rfl⟩⟩ #align fractional_ideal.map_mem_map FractionalIdeal.map_mem_map theorem map_injective (f : P →ₐ[R] P') (h : Function.Injective f) : Function.Injective (map f : FractionalIdeal S P → FractionalIdeal S P') := fun _ _ hIJ => ext fun _ => (map_mem_map h).symm.trans (hIJ.symm ▸ map_mem_map h) #align fractional_ideal.map_injective FractionalIdeal.map_injective def mapEquiv (g : P ≃ₐ[R] P') : FractionalIdeal S P ≃+* FractionalIdeal S P' where toFun := map g invFun := map g.symm map_add' I J := map_add I J _ map_mul' I J := map_mul I J _ left_inv I := by rw [← map_comp, AlgEquiv.symm_comp, map_id] right_inv I := by rw [← map_comp, AlgEquiv.comp_symm, map_id] #align fractional_ideal.map_equiv FractionalIdeal.mapEquiv @[simp] theorem coeFun_mapEquiv (g : P ≃ₐ[R] P') : (mapEquiv g : FractionalIdeal S P → FractionalIdeal S P') = map g := rfl #align fractional_ideal.coe_fun_map_equiv FractionalIdeal.coeFun_mapEquiv @[simp] theorem mapEquiv_apply (g : P ≃ₐ[R] P') (I : FractionalIdeal S P) : mapEquiv g I = map (↑g) I := rfl #align fractional_ideal.map_equiv_apply FractionalIdeal.mapEquiv_apply @[simp] theorem mapEquiv_symm (g : P ≃ₐ[R] P') : ((mapEquiv g).symm : FractionalIdeal S P' ≃+* _) = mapEquiv g.symm := rfl #align fractional_ideal.map_equiv_symm FractionalIdeal.mapEquiv_symm @[simp] theorem mapEquiv_refl : mapEquiv AlgEquiv.refl = RingEquiv.refl (FractionalIdeal S P) := RingEquiv.ext fun x => by simp #align fractional_ideal.map_equiv_refl FractionalIdeal.mapEquiv_refl theorem isFractional_span_iff {s : Set P} : IsFractional S (span R s) ↔ ∃ a ∈ S, ∀ b : P, b ∈ s → IsInteger R (a • b) := ⟨fun ⟨a, a_mem, h⟩ => ⟨a, a_mem, fun b hb => h b (subset_span hb)⟩, fun ⟨a, a_mem, h⟩ => ⟨a, a_mem, fun b hb => span_induction hb h (by rw [smul_zero] exact isInteger_zero) (fun x y hx hy => by rw [smul_add] exact isInteger_add hx hy) fun s x hx => by rw [smul_comm] exact isInteger_smul hx⟩⟩ #align fractional_ideal.is_fractional_span_iff FractionalIdeal.isFractional_span_iff theorem isFractional_of_fg {I : Submodule R P} (hI : I.FG) : IsFractional S I := by rcases hI with ⟨I, rfl⟩ rcases exist_integer_multiples_of_finset S I with ⟨⟨s, hs1⟩, hs⟩ rw [isFractional_span_iff] exact ⟨s, hs1, hs⟩ #align fractional_ideal.is_fractional_of_fg FractionalIdeal.isFractional_of_fg theorem mem_span_mul_finite_of_mem_mul {I J : FractionalIdeal S P} {x : P} (hx : x ∈ I * J) : ∃ T T' : Finset P, (T : Set P) ⊆ I ∧ (T' : Set P) ⊆ J ∧ x ∈ span R (T * T' : Set P) := Submodule.mem_span_mul_finite_of_mem_mul (by simpa using mem_coe.mpr hx) #align fractional_ideal.mem_span_mul_finite_of_mem_mul FractionalIdeal.mem_span_mul_finite_of_mem_mul variable (S) theorem coeIdeal_fg (inj : Function.Injective (algebraMap R P)) (I : Ideal R) : FG ((I : FractionalIdeal S P) : Submodule R P) ↔ I.FG := coeSubmodule_fg _ inj _ #align fractional_ideal.coe_ideal_fg FractionalIdeal.coeIdeal_fg variable {S} theorem fg_unit (I : (FractionalIdeal S P)ˣ) : FG (I : Submodule R P) := Submodule.fg_unit <\| Units.map (coeSubmoduleHom S P).toMonoidHom I #align fractional_ideal.fg_unit FractionalIdeal.fg_unit theorem fg_of_isUnit (I : FractionalIdeal S P) (h : IsUnit I) : FG (I : Submodule R P) := fg_unit h.unit #align fractional_ideal.fg_of_is_unit FractionalIdeal.fg_of_isUnit theorem _root_.Ideal.fg_of_isUnit (inj : Function.Injective (algebraMap R P)) (I : Ideal R) (h : IsUnit (I : FractionalIdeal S P)) : I.FG := by rw [← coeIdeal_fg S inj I] exact FractionalIdeal.fg_of_isUnit I h #align ideal.fg_of_is_unit Ideal.fg_of_isUnit variable (S P P') noncomputable irreducible_def canonicalEquiv : FractionalIdeal S P ≃+* FractionalIdeal S P' := mapEquiv { ringEquivOfRingEquiv P P' (RingEquiv.refl R) (show S.map _ = S by rw [RingEquiv.toMonoidHom_refl, Submonoid.map_id]) with commutes' := fun r => ringEquivOfRingEquiv_eq _ _ } #align fractional_ideal.canonical_equiv FractionalIdeal.canonicalEquiv @[simp] theorem mem_canonicalEquiv_apply {I : FractionalIdeal S P} {x : P'} : x ∈ canonicalEquiv S P P' I ↔ ∃ y ∈ I, IsLocalization.map P' (RingHom.id R) (fun y (hy : y ∈ S) => show RingHom.id R y ∈ S from hy) (y : P) = x := by rw [canonicalEquiv, mapEquiv_apply, mem_map] exact ⟨fun ⟨y, mem, Eq⟩ => ⟨y, mem, Eq⟩, fun ⟨y, mem, Eq⟩ => ⟨y, mem, Eq⟩⟩ #align fractional_ideal.mem_canonical_equiv_apply FractionalIdeal.mem_canonicalEquiv_apply @[simp] theorem canonicalEquiv_symm : (canonicalEquiv S P P').symm = canonicalEquiv S P' P := RingEquiv.ext fun I => SetLike.ext_iff.mpr fun x => by rw [mem_canonicalEquiv_apply, canonicalEquiv, mapEquiv_symm, mapEquiv_apply, mem_map] exact ⟨fun ⟨y, mem, Eq⟩ => ⟨y, mem, Eq⟩, fun ⟨y, mem, Eq⟩ => ⟨y, mem, Eq⟩⟩ #align fractional_ideal.canonical_equiv_symm FractionalIdeal.canonicalEquiv_symm theorem canonicalEquiv_flip (I) : canonicalEquiv S P P' (canonicalEquiv S P' P I) = I := by rw [← canonicalEquiv_symm]; erw [RingEquiv.apply_symm_apply] #align fractional_ideal.canonical_equiv_flip FractionalIdeal.canonicalEquiv_flip @[simp] theorem canonicalEquiv_canonicalEquiv (P'' : Type) [CommRing P''] [Algebra R P''] [IsLocalization S P''] (I : FractionalIdeal S P) : canonicalEquiv S P' P'' (canonicalEquiv S P P' I) = canonicalEquiv S P P'' I := by ext simp only [IsLocalization.map_map, RingHomInvPair.comp_eq₂, mem_canonicalEquiv_apply, exists_prop, exists_exists_and_eq_and] #align fractional_ideal.canonical_equiv_canonical_equiv FractionalIdeal.canonicalEquiv_canonicalEquiv theorem canonicalEquiv_trans_canonicalEquiv (P'' : Type) [CommRing P''] [Algebra R P''] [IsLocalization S P''] : (canonicalEquiv S P P').trans (canonicalEquiv S P' P'') = canonicalEquiv S P P'' := RingEquiv.ext (canonicalEquiv_canonicalEquiv S P P' P'') #align fractional_ideal.canonical_equiv_trans_canonical_equiv FractionalIdeal.canonicalEquiv_trans_canonicalEquiv @[simp] theorem canonicalEquiv_coeIdeal (I : Ideal R) : canonicalEquiv S P P' I = I := by ext simp [IsLocalization.map_eq] #align fractional_ideal.canonical_equiv_coe_ideal FractionalIdeal.canonicalEquiv_coeIdeal @[simp] theorem canonicalEquiv_self : canonicalEquiv S P P = RingEquiv.refl _ := by rw [← canonicalEquiv_trans_canonicalEquiv S P P] convert (canonicalEquiv S P P).symm_trans_self exact (canonicalEquiv_symm S P P).symm #align fractional_ideal.canonical_equiv_self FractionalIdeal.canonicalEquiv_self end section Quotient open scoped Classical variable {R₁ : Type} [CommRing R₁] {K : Type} [Field K] variable [Algebra R₁ K] [frac : IsFractionRing R₁ K] instance : Nontrivial (FractionalIdeal R₁⁰ K) := ⟨⟨0, 1, fun h => have this : (1 : K) ∈ (0 : FractionalIdeal R₁⁰ K) := by rw [← (algebraMap R₁ K).map_one] simpa only [h] using coe_mem_one R₁⁰ 1 one_ne_zero ((mem_zero_iff _).mp this)⟩⟩ theorem ne_zero_of_mul_eq_one (I J : FractionalIdeal R₁⁰ K) (h : I * J = 1) : I ≠ 0 := fun hI => zero_ne_one' (FractionalIdeal R₁⁰ K) (by convert h simp [hI]) #align fractional_ideal.ne_zero_of_mul_eq_one FractionalIdeal.ne_zero_of_mul_eq_one variable [IsDomain R₁] theorem _root_.IsFractional.div_of_nonzero {I J : Submodule R₁ K} : IsFractional R₁⁰ I → IsFractional R₁⁰ J → J ≠ 0 → IsFractional R₁⁰ (I / J) \| ⟨aI, haI, hI⟩, ⟨aJ, haJ, hJ⟩, h => by obtain ⟨y, mem_J, not_mem_zero⟩ := SetLike.exists_of_lt (show 0 < J by simpa only using bot_lt_iff_ne_bot.mpr h) obtain ⟨y', hy'⟩ := hJ y mem_J use aI * y' constructor · apply (nonZeroDivisors R₁).mul_mem haI (mem_nonZeroDivisors_iff_ne_zero.mpr _) intro y'_eq_zero have : algebraMap R₁ K aJ * y = 0 := by rw [← Algebra.smul_def, ← hy', y'_eq_zero, RingHom.map_zero] have y_zero := (mul_eq_zero.mp this).resolve_left (mt ((injective_iff_map_eq_zero (algebraMap R₁ K)).1 (IsFractionRing.injective _ _) _) (mem_nonZeroDivisors_iff_ne_zero.mp haJ)) apply not_mem_zero simpa intro b hb convert hI _ (hb _ (Submodule.smul_mem _ aJ mem_J)) using 1 rw [← hy', mul_comm b, ← Algebra.smul_def, mul_smul] #align is_fractional.div_of_nonzero IsFractional.div_of_nonzero theorem fractional_div_of_nonzero {I J : FractionalIdeal R₁⁰ K} (h : J ≠ 0) : IsFractional R₁⁰ (I / J : Submodule R₁ K) := I.isFractional.div_of_nonzero J.isFractional fun H => h <\| coeToSubmodule_injective <\| H.trans coe_zero.symm #align fractional_ideal.fractional_div_of_nonzero FractionalIdeal.fractional_div_of_nonzero noncomputable instance : Div (FractionalIdeal R₁⁰ K) := ⟨fun I J => if h : J = 0 then 0 else ⟨I / J, fractional_div_of_nonzero h⟩⟩ variable {I J : FractionalIdeal R₁⁰ K} @[simp] theorem div_zero {I : FractionalIdeal R₁⁰ K} : I / 0 = 0 := dif_pos rfl #align fractional_ideal.div_zero FractionalIdeal.div_zero theorem div_nonzero {I J : FractionalIdeal R₁⁰ K} (h : J ≠ 0) : I / J = ⟨I / J, fractional_div_of_nonzero h⟩ := dif_neg h #align fractional_ideal.div_nonzero FractionalIdeal.div_nonzero @[simp] theorem coe_div {I J : FractionalIdeal R₁⁰ K} (hJ : J ≠ 0) : (↑(I / J) : Submodule R₁ K) = ↑I / (↑J : Submodule R₁ K) := congr_arg _ (dif_neg hJ) #align fractional_ideal.coe_div FractionalIdeal.coe_div	Mathlib/RingTheory/FractionalIdeal/Operations.lean	449	452	theorem mem_div_iff_of_nonzero {I J : FractionalIdeal R₁⁰ K} (h : J ≠ 0) {x} : x ∈ I / J ↔ ∀ y ∈ J, x * y ∈ I := by	rw [div_nonzero h] exact Submodule.mem_div_iff_forall_mul_mem
import Mathlib.FieldTheory.Separable import Mathlib.FieldTheory.SplittingField.Construction import Mathlib.Algebra.CharP.Reduced open Function Polynomial class PerfectRing (R : Type) (p : ℕ) [CommSemiring R] [ExpChar R p] : Prop where bijective_frobenius : Bijective <\| frobenius R p section PerfectRing variable (R : Type) (p m n : ℕ) [CommSemiring R] [ExpChar R p] lemma PerfectRing.ofSurjective (R : Type) (p : ℕ) [CommRing R] [ExpChar R p] [IsReduced R] (h : Surjective <\| frobenius R p) : PerfectRing R p := ⟨frobenius_inj R p, h⟩ #align perfect_ring.of_surjective PerfectRing.ofSurjective instance PerfectRing.ofFiniteOfIsReduced (R : Type) [CommRing R] [ExpChar R p] [Finite R] [IsReduced R] : PerfectRing R p := ofSurjective _ _ <\| Finite.surjective_of_injective (frobenius_inj R p) variable [PerfectRing R p] @[simp] theorem bijective_frobenius : Bijective (frobenius R p) := PerfectRing.bijective_frobenius theorem bijective_iterateFrobenius : Bijective (iterateFrobenius R p n) := coe_iterateFrobenius R p n ▸ (bijective_frobenius R p).iterate n @[simp] theorem injective_frobenius : Injective (frobenius R p) := (bijective_frobenius R p).1 @[simp] theorem surjective_frobenius : Surjective (frobenius R p) := (bijective_frobenius R p).2 @[simps! apply] noncomputable def frobeniusEquiv : R ≃+* R := RingEquiv.ofBijective (frobenius R p) PerfectRing.bijective_frobenius #align frobenius_equiv frobeniusEquiv @[simp] theorem coe_frobeniusEquiv : ⇑(frobeniusEquiv R p) = frobenius R p := rfl #align coe_frobenius_equiv coe_frobeniusEquiv theorem frobeniusEquiv_def (x : R) : frobeniusEquiv R p x = x ^ p := rfl @[simps! apply] noncomputable def iterateFrobeniusEquiv : R ≃+* R := RingEquiv.ofBijective (iterateFrobenius R p n) (bijective_iterateFrobenius R p n) @[simp] theorem coe_iterateFrobeniusEquiv : ⇑(iterateFrobeniusEquiv R p n) = iterateFrobenius R p n := rfl theorem iterateFrobeniusEquiv_def (x : R) : iterateFrobeniusEquiv R p n x = x ^ p ^ n := rfl theorem iterateFrobeniusEquiv_add_apply (x : R) : iterateFrobeniusEquiv R p (m + n) x = iterateFrobeniusEquiv R p m (iterateFrobeniusEquiv R p n x) := iterateFrobenius_add_apply R p m n x theorem iterateFrobeniusEquiv_add : iterateFrobeniusEquiv R p (m + n) = (iterateFrobeniusEquiv R p n).trans (iterateFrobeniusEquiv R p m) := RingEquiv.ext (iterateFrobeniusEquiv_add_apply R p m n) theorem iterateFrobeniusEquiv_symm_add_apply (x : R) : (iterateFrobeniusEquiv R p (m + n)).symm x = (iterateFrobeniusEquiv R p m).symm ((iterateFrobeniusEquiv R p n).symm x) := (iterateFrobeniusEquiv R p (m + n)).injective <\| by rw [RingEquiv.apply_symm_apply, add_comm, iterateFrobeniusEquiv_add_apply, RingEquiv.apply_symm_apply, RingEquiv.apply_symm_apply] theorem iterateFrobeniusEquiv_symm_add : (iterateFrobeniusEquiv R p (m + n)).symm = (iterateFrobeniusEquiv R p n).symm.trans (iterateFrobeniusEquiv R p m).symm := RingEquiv.ext (iterateFrobeniusEquiv_symm_add_apply R p m n) theorem iterateFrobeniusEquiv_zero_apply (x : R) : iterateFrobeniusEquiv R p 0 x = x := by rw [iterateFrobeniusEquiv_def, pow_zero, pow_one] theorem iterateFrobeniusEquiv_one_apply (x : R) : iterateFrobeniusEquiv R p 1 x = x ^ p := by rw [iterateFrobeniusEquiv_def, pow_one] @[simp] theorem iterateFrobeniusEquiv_zero : iterateFrobeniusEquiv R p 0 = RingEquiv.refl R := RingEquiv.ext (iterateFrobeniusEquiv_zero_apply R p) @[simp] theorem iterateFrobeniusEquiv_one : iterateFrobeniusEquiv R p 1 = frobeniusEquiv R p := RingEquiv.ext (iterateFrobeniusEquiv_one_apply R p) theorem iterateFrobeniusEquiv_eq_pow : iterateFrobeniusEquiv R p n = frobeniusEquiv R p ^ n := DFunLike.ext' <\| show _ = ⇑(RingAut.toPerm _ _) by rw [map_pow, Equiv.Perm.coe_pow]; exact (pow_iterate p n).symm theorem iterateFrobeniusEquiv_symm : (iterateFrobeniusEquiv R p n).symm = (frobeniusEquiv R p).symm ^ n := by rw [iterateFrobeniusEquiv_eq_pow]; exact (inv_pow _ _).symm @[simp] theorem frobeniusEquiv_symm_apply_frobenius (x : R) : (frobeniusEquiv R p).symm (frobenius R p x) = x := leftInverse_surjInv PerfectRing.bijective_frobenius x @[simp] theorem frobenius_apply_frobeniusEquiv_symm (x : R) : frobenius R p ((frobeniusEquiv R p).symm x) = x := surjInv_eq _ _ @[simp]	Mathlib/FieldTheory/Perfect.lean	146	148	theorem frobenius_comp_frobeniusEquiv_symm : (frobenius R p).comp (frobeniusEquiv R p).symm = RingHom.id R := by	ext; simp
import Mathlib.Algebra.CharP.Two import Mathlib.Data.Nat.Factorization.Basic import Mathlib.Data.Nat.Periodic import Mathlib.Data.ZMod.Basic import Mathlib.Tactic.Monotonicity #align_import data.nat.totient from "leanprover-community/mathlib"@"5cc2dfdd3e92f340411acea4427d701dc7ed26f8" open Finset namespace Nat def totient (n : ℕ) : ℕ := ((range n).filter n.Coprime).card #align nat.totient Nat.totient @[inherit_doc] scoped notation "φ" => Nat.totient @[simp] theorem totient_zero : φ 0 = 0 := rfl #align nat.totient_zero Nat.totient_zero @[simp] theorem totient_one : φ 1 = 1 := rfl #align nat.totient_one Nat.totient_one theorem totient_eq_card_coprime (n : ℕ) : φ n = ((range n).filter n.Coprime).card := rfl #align nat.totient_eq_card_coprime Nat.totient_eq_card_coprime	Mathlib/Data/Nat/Totient.lean	51	57	theorem totient_eq_card_lt_and_coprime (n : ℕ) : φ n = Nat.card { m \| m < n ∧ n.Coprime m } := by	let e : { m \| m < n ∧ n.Coprime m } ≃ Finset.filter n.Coprime (Finset.range n) := { toFun := fun m => ⟨m, by simpa only [Finset.mem_filter, Finset.mem_range] using m.property⟩ invFun := fun m => ⟨m, by simpa only [Finset.mem_filter, Finset.mem_range] using m.property⟩ left_inv := fun m => by simp only [Subtype.coe_mk, Subtype.coe_eta] right_inv := fun m => by simp only [Subtype.coe_mk, Subtype.coe_eta] } rw [totient_eq_card_coprime, card_congr e, card_eq_fintype_card, Fintype.card_coe]
import Mathlib.Algebra.MvPolynomial.Variables #align_import data.mv_polynomial.supported from "leanprover-community/mathlib"@"2f5b500a507264de86d666a5f87ddb976e2d8de4" universe u v w namespace MvPolynomial variable {σ τ : Type*} {R : Type u} {S : Type v} {r : R} {e : ℕ} {n m : σ} section CommSemiring variable [CommSemiring R] {p q : MvPolynomial σ R} variable (R) noncomputable def supported (s : Set σ) : Subalgebra R (MvPolynomial σ R) := Algebra.adjoin R (X '' s) #align mv_polynomial.supported MvPolynomial.supported variable {R} open Algebra theorem supported_eq_range_rename (s : Set σ) : supported R s = (rename ((↑) : s → σ)).range := by rw [supported, Set.image_eq_range, adjoin_range_eq_range_aeval, rename] congr #align mv_polynomial.supported_eq_range_rename MvPolynomial.supported_eq_range_rename noncomputable def supportedEquivMvPolynomial (s : Set σ) : supported R s ≃ₐ[R] MvPolynomial s R := (Subalgebra.equivOfEq _ _ (supported_eq_range_rename s)).trans (AlgEquiv.ofInjective (rename ((↑) : s → σ)) (rename_injective _ Subtype.val_injective)).symm #align mv_polynomial.supported_equiv_mv_polynomial MvPolynomial.supportedEquivMvPolynomial @[simp, nolint simpNF] -- Porting note: the `simpNF` linter complained about this lemma. theorem supportedEquivMvPolynomial_symm_C (s : Set σ) (x : R) : (supportedEquivMvPolynomial s).symm (C x) = algebraMap R (supported R s) x := by ext1 simp [supportedEquivMvPolynomial, MvPolynomial.algebraMap_eq] set_option linter.uppercaseLean3 false in #align mv_polynomial.supported_equiv_mv_polynomial_symm_C MvPolynomial.supportedEquivMvPolynomial_symm_C @[simp, nolint simpNF] -- Porting note: the `simpNF` linter complained about this lemma. theorem supportedEquivMvPolynomial_symm_X (s : Set σ) (i : s) : (↑((supportedEquivMvPolynomial s).symm (X i : MvPolynomial s R)) : MvPolynomial σ R) = X ↑i := by simp [supportedEquivMvPolynomial] set_option linter.uppercaseLean3 false in #align mv_polynomial.supported_equiv_mv_polynomial_symm_X MvPolynomial.supportedEquivMvPolynomial_symm_X variable {s t : Set σ} theorem mem_supported : p ∈ supported R s ↔ ↑p.vars ⊆ s := by classical rw [supported_eq_range_rename, AlgHom.mem_range] constructor · rintro ⟨p, rfl⟩ refine _root_.trans (Finset.coe_subset.2 (vars_rename _ _)) ?_ simp · intro hs exact exists_rename_eq_of_vars_subset_range p ((↑) : s → σ) Subtype.val_injective (by simpa) #align mv_polynomial.mem_supported MvPolynomial.mem_supported theorem supported_eq_vars_subset : (supported R s : Set (MvPolynomial σ R)) = { p \| ↑p.vars ⊆ s } := Set.ext fun _ ↦ mem_supported #align mv_polynomial.supported_eq_vars_subset MvPolynomial.supported_eq_vars_subset @[simp] theorem mem_supported_vars (p : MvPolynomial σ R) : p ∈ supported R (↑p.vars : Set σ) := by rw [mem_supported] #align mv_polynomial.mem_supported_vars MvPolynomial.mem_supported_vars variable (s) theorem supported_eq_adjoin_X : supported R s = Algebra.adjoin R (X '' s) := rfl set_option linter.uppercaseLean3 false in #align mv_polynomial.supported_eq_adjoin_X MvPolynomial.supported_eq_adjoin_X @[simp] theorem supported_univ : supported R (Set.univ : Set σ) = ⊤ := by simp [Algebra.eq_top_iff, mem_supported] #align mv_polynomial.supported_univ MvPolynomial.supported_univ @[simp] theorem supported_empty : supported R (∅ : Set σ) = ⊥ := by simp [supported_eq_adjoin_X] #align mv_polynomial.supported_empty MvPolynomial.supported_empty variable {s} theorem supported_mono (st : s ⊆ t) : supported R s ≤ supported R t := Algebra.adjoin_mono (Set.image_subset _ st) #align mv_polynomial.supported_mono MvPolynomial.supported_mono @[simp] theorem X_mem_supported [Nontrivial R] {i : σ} : X i ∈ supported R s ↔ i ∈ s := by simp [mem_supported] set_option linter.uppercaseLean3 false in #align mv_polynomial.X_mem_supported MvPolynomial.X_mem_supported @[simp]	Mathlib/Algebra/MvPolynomial/Supported.lean	123	127	theorem supported_le_supported_iff [Nontrivial R] : supported R s ≤ supported R t ↔ s ⊆ t := by	constructor · intro h i simpa using @h (X i) · exact supported_mono
import Mathlib.RingTheory.Ideal.Maps #align_import ring_theory.ideal.prod from "leanprover-community/mathlib"@"052f6013363326d50cb99c6939814a4b8eb7b301" universe u v variable {R : Type u} {S : Type v} [Semiring R] [Semiring S] (I I' : Ideal R) (J J' : Ideal S) namespace Ideal def prod : Ideal (R × S) where carrier := { x \| x.fst ∈ I ∧ x.snd ∈ J } zero_mem' := by simp add_mem' := by rintro ⟨a₁, a₂⟩ ⟨b₁, b₂⟩ ⟨ha₁, ha₂⟩ ⟨hb₁, hb₂⟩ exact ⟨I.add_mem ha₁ hb₁, J.add_mem ha₂ hb₂⟩ smul_mem' := by rintro ⟨a₁, a₂⟩ ⟨b₁, b₂⟩ ⟨hb₁, hb₂⟩ exact ⟨I.mul_mem_left _ hb₁, J.mul_mem_left _ hb₂⟩ #align ideal.prod Ideal.prod @[simp] theorem mem_prod {r : R} {s : S} : (⟨r, s⟩ : R × S) ∈ prod I J ↔ r ∈ I ∧ s ∈ J := Iff.rfl #align ideal.mem_prod Ideal.mem_prod @[simp] theorem prod_top_top : prod (⊤ : Ideal R) (⊤ : Ideal S) = ⊤ := Ideal.ext <\| by simp #align ideal.prod_top_top Ideal.prod_top_top theorem ideal_prod_eq (I : Ideal (R × S)) : I = Ideal.prod (map (RingHom.fst R S) I : Ideal R) (map (RingHom.snd R S) I) := by apply Ideal.ext rintro ⟨r, s⟩ rw [mem_prod, mem_map_iff_of_surjective (RingHom.fst R S) Prod.fst_surjective, mem_map_iff_of_surjective (RingHom.snd R S) Prod.snd_surjective] refine ⟨fun h => ⟨⟨_, ⟨h, rfl⟩⟩, ⟨_, ⟨h, rfl⟩⟩⟩, ?_⟩ rintro ⟨⟨⟨r, s'⟩, ⟨h₁, rfl⟩⟩, ⟨⟨r', s⟩, ⟨h₂, rfl⟩⟩⟩ simpa using I.add_mem (I.mul_mem_left (1, 0) h₁) (I.mul_mem_left (0, 1) h₂) #align ideal.ideal_prod_eq Ideal.ideal_prod_eq @[simp] theorem map_fst_prod (I : Ideal R) (J : Ideal S) : map (RingHom.fst R S) (prod I J) = I := by ext x rw [mem_map_iff_of_surjective (RingHom.fst R S) Prod.fst_surjective] exact ⟨by rintro ⟨x, ⟨h, rfl⟩⟩ exact h.1, fun h => ⟨⟨x, 0⟩, ⟨⟨h, Ideal.zero_mem _⟩, rfl⟩⟩⟩ #align ideal.map_fst_prod Ideal.map_fst_prod @[simp] theorem map_snd_prod (I : Ideal R) (J : Ideal S) : map (RingHom.snd R S) (prod I J) = J := by ext x rw [mem_map_iff_of_surjective (RingHom.snd R S) Prod.snd_surjective] exact ⟨by rintro ⟨x, ⟨h, rfl⟩⟩ exact h.2, fun h => ⟨⟨0, x⟩, ⟨⟨Ideal.zero_mem _, h⟩, rfl⟩⟩⟩ #align ideal.map_snd_prod Ideal.map_snd_prod @[simp] theorem map_prodComm_prod : map ((RingEquiv.prodComm : R × S ≃+* S × R) : R × S →+* S × R) (prod I J) = prod J I := by refine Trans.trans (ideal_prod_eq _) ?_ simp [map_map] #align ideal.map_prod_comm_prod Ideal.map_prodComm_prod def idealProdEquiv : Ideal (R × S) ≃ Ideal R × Ideal S where toFun I := ⟨map (RingHom.fst R S) I, map (RingHom.snd R S) I⟩ invFun I := prod I.1 I.2 left_inv I := (ideal_prod_eq I).symm right_inv := fun ⟨I, J⟩ => by simp #align ideal.ideal_prod_equiv Ideal.idealProdEquiv @[simp] theorem idealProdEquiv_symm_apply (I : Ideal R) (J : Ideal S) : idealProdEquiv.symm ⟨I, J⟩ = prod I J := rfl #align ideal.ideal_prod_equiv_symm_apply Ideal.idealProdEquiv_symm_apply theorem prod.ext_iff {I I' : Ideal R} {J J' : Ideal S} : prod I J = prod I' J' ↔ I = I' ∧ J = J' := by simp only [← idealProdEquiv_symm_apply, idealProdEquiv.symm.injective.eq_iff, Prod.mk.inj_iff] #align ideal.prod.ext_iff Ideal.prod.ext_iff theorem isPrime_of_isPrime_prod_top {I : Ideal R} (h : (Ideal.prod I (⊤ : Ideal S)).IsPrime) : I.IsPrime := by constructor · contrapose! h rw [h, prod_top_top, isPrime_iff] simp [isPrime_iff, h] · intro x y hxy have : (⟨x, 1⟩ : R × S) * ⟨y, 1⟩ ∈ prod I ⊤ := by rw [Prod.mk_mul_mk, mul_one, mem_prod] exact ⟨hxy, trivial⟩ simpa using h.mem_or_mem this #align ideal.is_prime_of_is_prime_prod_top Ideal.isPrime_of_isPrime_prod_top theorem isPrime_of_isPrime_prod_top' {I : Ideal S} (h : (Ideal.prod (⊤ : Ideal R) I).IsPrime) : I.IsPrime := by apply isPrime_of_isPrime_prod_top (S := R) rw [← map_prodComm_prod] -- Note: couldn't synthesize the right instances without the `R` and `S` hints exact map_isPrime_of_equiv (RingEquiv.prodComm (R := R) (S := S)) #align ideal.is_prime_of_is_prime_prod_top' Ideal.isPrime_of_isPrime_prod_top' theorem isPrime_ideal_prod_top {I : Ideal R} [h : I.IsPrime] : (prod I (⊤ : Ideal S)).IsPrime := by constructor · rcases h with ⟨h, -⟩ contrapose! h rw [← prod_top_top, prod.ext_iff] at h exact h.1 rintro ⟨r₁, s₁⟩ ⟨r₂, s₂⟩ ⟨h₁, _⟩ cases' h.mem_or_mem h₁ with h h · exact Or.inl ⟨h, trivial⟩ · exact Or.inr ⟨h, trivial⟩ #align ideal.is_prime_ideal_prod_top Ideal.isPrime_ideal_prod_top	Mathlib/RingTheory/Ideal/Prod.lean	141	145	theorem isPrime_ideal_prod_top' {I : Ideal S} [h : I.IsPrime] : (prod (⊤ : Ideal R) I).IsPrime := by	letI : IsPrime (prod I (⊤ : Ideal R)) := isPrime_ideal_prod_top rw [← map_prodComm_prod] -- Note: couldn't synthesize the right instances without the `R` and `S` hints exact map_isPrime_of_equiv (RingEquiv.prodComm (R := S) (S := R))
import Mathlib.Tactic.NormNum.Basic import Mathlib.Data.Rat.Cast.CharZero import Mathlib.Algebra.Field.Basic set_option autoImplicit true namespace Mathlib.Meta.NormNum open Lean.Meta Qq def inferCharZeroOfRing {α : Q(Type u)} (_i : Q(Ring $α) := by with_reducible assumption) : MetaM Q(CharZero $α) := return ← synthInstanceQ (q(CharZero $α) : Q(Prop)) <\|> throwError "not a characteristic zero ring" def inferCharZeroOfRing? {α : Q(Type u)} (_i : Q(Ring $α) := by with_reducible assumption) : MetaM (Option Q(CharZero $α)) := return (← trySynthInstanceQ (q(CharZero $α) : Q(Prop))).toOption def inferCharZeroOfAddMonoidWithOne {α : Q(Type u)} (_i : Q(AddMonoidWithOne $α) := by with_reducible assumption) : MetaM Q(CharZero $α) := return ← synthInstanceQ (q(CharZero $α) : Q(Prop)) <\|> throwError "not a characteristic zero AddMonoidWithOne" def inferCharZeroOfAddMonoidWithOne? {α : Q(Type u)} (_i : Q(AddMonoidWithOne $α) := by with_reducible assumption) : MetaM (Option Q(CharZero $α)) := return (← trySynthInstanceQ (q(CharZero $α) : Q(Prop))).toOption def inferCharZeroOfDivisionRing {α : Q(Type u)} (_i : Q(DivisionRing $α) := by with_reducible assumption) : MetaM Q(CharZero $α) := return ← synthInstanceQ (q(CharZero $α) : Q(Prop)) <\|> throwError "not a characteristic zero division ring" def inferCharZeroOfDivisionRing? {α : Q(Type u)} (_i : Q(DivisionRing $α) := by with_reducible assumption) : MetaM (Option Q(CharZero $α)) := return (← trySynthInstanceQ (q(CharZero $α) : Q(Prop))).toOption theorem isRat_mkRat : {a na n : ℤ} → {b nb d : ℕ} → IsInt a na → IsNat b nb → IsRat (na / nb : ℚ) n d → IsRat (mkRat a b) n d \| _, _, _, _, _, _, ⟨rfl⟩, ⟨rfl⟩, ⟨_, h⟩ => by rw [Rat.mkRat_eq_div]; exact ⟨_, h⟩ @[norm_num mkRat _ _] def evalMkRat : NormNumExt where eval {u α} (e : Q(ℚ)) : MetaM (Result e) := do let .app (.app (.const ``mkRat _) (a : Q(ℤ))) (b : Q(ℕ)) ← whnfR e \| failure haveI' : $e =Q mkRat $a $b := ⟨⟩ let ra ← derive a let some ⟨_, na, pa⟩ := ra.toInt (q(Int.instRing) : Q(Ring Int)) \| failure let ⟨nb, pb⟩ ← deriveNat q($b) q(AddCommMonoidWithOne.toAddMonoidWithOne) let rab ← derive q($na / $nb : Rat) let ⟨q, n, d, p⟩ ← rab.toRat' q(Rat.instDivisionRing) return .isRat' _ q n d q(isRat_mkRat $pa $pb $p) theorem isNat_ratCast [DivisionRing R] : {q : ℚ} → {n : ℕ} → IsNat q n → IsNat (q : R) n \| _, _, ⟨rfl⟩ => ⟨by simp⟩ theorem isInt_ratCast [DivisionRing R] : {q : ℚ} → {n : ℤ} → IsInt q n → IsInt (q : R) n \| _, _, ⟨rfl⟩ => ⟨by simp⟩ theorem isRat_ratCast [DivisionRing R] [CharZero R] : {q : ℚ} → {n : ℤ} → {d : ℕ} → IsRat q n d → IsRat (q : R) n d \| _, _, _, ⟨⟨qi,_,_⟩, rfl⟩ => ⟨⟨qi, by norm_cast, by norm_cast⟩, by simp only []; norm_cast⟩ @[norm_num Rat.cast _, RatCast.ratCast _] def evalRatCast : NormNumExt where eval {u α} e := do let dα ← inferDivisionRing α let .app r (a : Q(ℚ)) ← whnfR e \| failure guard <\|← withNewMCtxDepth <\| isDefEq r q(Rat.cast (K := $α)) let r ← derive q($a) haveI' : $e =Q Rat.cast $a := ⟨⟩ match r with \| .isNat _ na pa => assumeInstancesCommute return .isNat _ na q(isNat_ratCast $pa) \| .isNegNat _ na pa => assumeInstancesCommute return .isNegNat _ na q(isInt_ratCast $pa) \| .isRat _ qa na da pa => assumeInstancesCommute let i ← inferCharZeroOfDivisionRing dα return .isRat dα qa na da q(isRat_ratCast $pa) \| _ => failure theorem isRat_inv_pos {α} [DivisionRing α] [CharZero α] {a : α} {n d : ℕ} : IsRat a (.ofNat (Nat.succ n)) d → IsRat a⁻¹ (.ofNat d) (Nat.succ n) := by rintro ⟨_, rfl⟩ have := invertibleOfNonzero (α := α) (Nat.cast_ne_zero.2 (Nat.succ_ne_zero n)) exact ⟨this, by simp⟩ theorem isRat_inv_one {α} [DivisionRing α] : {a : α} → IsNat a (nat_lit 1) → IsNat a⁻¹ (nat_lit 1) \| _, ⟨rfl⟩ => ⟨by simp⟩ theorem isRat_inv_zero {α} [DivisionRing α] : {a : α} → IsNat a (nat_lit 0) → IsNat a⁻¹ (nat_lit 0) \| _, ⟨rfl⟩ => ⟨by simp⟩ theorem isRat_inv_neg_one {α} [DivisionRing α] : {a : α} → IsInt a (.negOfNat (nat_lit 1)) → IsInt a⁻¹ (.negOfNat (nat_lit 1)) \| _, ⟨rfl⟩ => ⟨by simp [inv_neg_one]⟩	Mathlib/Tactic/NormNum/Inv.lean	124	131	theorem isRat_inv_neg {α} [DivisionRing α] [CharZero α] {a : α} {n d : ℕ} : IsRat a (.negOfNat (Nat.succ n)) d → IsRat a⁻¹ (.negOfNat d) (Nat.succ n) := by	rintro ⟨_, rfl⟩ simp only [Int.negOfNat_eq] have := invertibleOfNonzero (α := α) (Nat.cast_ne_zero.2 (Nat.succ_ne_zero n)) generalize Nat.succ n = n at * use this; simp only [Int.ofNat_eq_coe, Int.cast_neg, Int.cast_natCast, invOf_eq_inv, inv_neg, neg_mul, mul_inv_rev, inv_inv]
import Mathlib.Algebra.CharP.Two import Mathlib.Algebra.CharP.Reduced import Mathlib.Algebra.NeZero import Mathlib.Algebra.Polynomial.RingDivision import Mathlib.GroupTheory.SpecificGroups.Cyclic import Mathlib.NumberTheory.Divisors import Mathlib.RingTheory.IntegralDomain import Mathlib.Tactic.Zify #align_import ring_theory.roots_of_unity.basic from "leanprover-community/mathlib"@"7fdeecc0d03cd40f7a165e6cf00a4d2286db599f" open scoped Classical Polynomial noncomputable section open Polynomial open Finset variable {M N G R S F : Type} variable [CommMonoid M] [CommMonoid N] [DivisionCommMonoid G] section rootsOfUnity variable {k l : ℕ+} def rootsOfUnity (k : ℕ+) (M : Type) [CommMonoid M] : Subgroup Mˣ where carrier := {ζ \| ζ ^ (k : ℕ) = 1} one_mem' := one_pow _ mul_mem' _ _ := by simp_all only [Set.mem_setOf_eq, mul_pow, one_mul] inv_mem' _ := by simp_all only [Set.mem_setOf_eq, inv_pow, inv_one] #align roots_of_unity rootsOfUnity @[simp] theorem mem_rootsOfUnity (k : ℕ+) (ζ : Mˣ) : ζ ∈ rootsOfUnity k M ↔ ζ ^ (k : ℕ) = 1 := Iff.rfl #align mem_roots_of_unity mem_rootsOfUnity theorem mem_rootsOfUnity' (k : ℕ+) (ζ : Mˣ) : ζ ∈ rootsOfUnity k M ↔ (ζ : M) ^ (k : ℕ) = 1 := by rw [mem_rootsOfUnity]; norm_cast #align mem_roots_of_unity' mem_rootsOfUnity' @[simp] theorem rootsOfUnity_one (M : Type) [CommMonoid M] : rootsOfUnity 1 M = ⊥ := by ext; simp theorem rootsOfUnity.coe_injective {n : ℕ+} : Function.Injective (fun x : rootsOfUnity n M ↦ x.val.val) := Units.ext.comp fun _ _ => Subtype.eq #align roots_of_unity.coe_injective rootsOfUnity.coe_injective @[simps! coe_val] def rootsOfUnity.mkOfPowEq (ζ : M) {n : ℕ+} (h : ζ ^ (n : ℕ) = 1) : rootsOfUnity n M := ⟨Units.ofPowEqOne ζ n h n.ne_zero, Units.pow_ofPowEqOne _ _⟩ #align roots_of_unity.mk_of_pow_eq rootsOfUnity.mkOfPowEq #align roots_of_unity.mk_of_pow_eq_coe_coe rootsOfUnity.val_mkOfPowEq_coe @[simp] theorem rootsOfUnity.coe_mkOfPowEq {ζ : M} {n : ℕ+} (h : ζ ^ (n : ℕ) = 1) : ((rootsOfUnity.mkOfPowEq _ h : Mˣ) : M) = ζ := rfl #align roots_of_unity.coe_mk_of_pow_eq rootsOfUnity.coe_mkOfPowEq theorem rootsOfUnity_le_of_dvd (h : k ∣ l) : rootsOfUnity k M ≤ rootsOfUnity l M := by obtain ⟨d, rfl⟩ := h intro ζ h simp_all only [mem_rootsOfUnity, PNat.mul_coe, pow_mul, one_pow] #align roots_of_unity_le_of_dvd rootsOfUnity_le_of_dvd theorem map_rootsOfUnity (f : Mˣ → Nˣ) (k : ℕ+) : (rootsOfUnity k M).map f ≤ rootsOfUnity k N := by rintro _ ⟨ζ, h, rfl⟩ simp_all only [← map_pow, mem_rootsOfUnity, SetLike.mem_coe, MonoidHom.map_one] #align map_roots_of_unity map_rootsOfUnity @[norm_cast] theorem rootsOfUnity.coe_pow [CommMonoid R] (ζ : rootsOfUnity k R) (m : ℕ) : (((ζ ^ m :) : Rˣ) : R) = ((ζ : Rˣ) : R) ^ m := by rw [Subgroup.coe_pow, Units.val_pow_eq_pow_val] #align roots_of_unity.coe_pow rootsOfUnity.coe_pow @[mk_iff IsPrimitiveRoot.iff_def] structure IsPrimitiveRoot (ζ : M) (k : ℕ) : Prop where pow_eq_one : ζ ^ (k : ℕ) = 1 dvd_of_pow_eq_one : ∀ l : ℕ, ζ ^ l = 1 → k ∣ l #align is_primitive_root IsPrimitiveRoot #align is_primitive_root.iff_def IsPrimitiveRoot.iff_def @[simps!] def IsPrimitiveRoot.toRootsOfUnity {μ : M} {n : ℕ+} (h : IsPrimitiveRoot μ n) : rootsOfUnity n M := rootsOfUnity.mkOfPowEq μ h.pow_eq_one #align is_primitive_root.to_roots_of_unity IsPrimitiveRoot.toRootsOfUnity #align is_primitive_root.coe_to_roots_of_unity_coe IsPrimitiveRoot.val_toRootsOfUnity_coe #align is_primitive_root.coe_inv_to_roots_of_unity_coe IsPrimitiveRoot.val_inv_toRootsOfUnity_coe namespace IsPrimitiveRoot variable {k l : ℕ} theorem mk_of_lt (ζ : M) (hk : 0 < k) (h1 : ζ ^ k = 1) (h : ∀ l : ℕ, 0 < l → l < k → ζ ^ l ≠ 1) : IsPrimitiveRoot ζ k := by refine ⟨h1, fun l hl => ?_⟩ suffices k.gcd l = k by exact this ▸ k.gcd_dvd_right l rw [eq_iff_le_not_lt] refine ⟨Nat.le_of_dvd hk (k.gcd_dvd_left l), ?_⟩ intro h'; apply h _ (Nat.gcd_pos_of_pos_left _ hk) h' exact pow_gcd_eq_one _ h1 hl #align is_primitive_root.mk_of_lt IsPrimitiveRoot.mk_of_lt section CommMonoid variable {ζ : M} {f : F} (h : IsPrimitiveRoot ζ k) @[nontriviality] theorem of_subsingleton [Subsingleton M] (x : M) : IsPrimitiveRoot x 1 := ⟨Subsingleton.elim _ _, fun _ _ => one_dvd _⟩ #align is_primitive_root.of_subsingleton IsPrimitiveRoot.of_subsingleton theorem pow_eq_one_iff_dvd (l : ℕ) : ζ ^ l = 1 ↔ k ∣ l := ⟨h.dvd_of_pow_eq_one l, by rintro ⟨i, rfl⟩; simp only [pow_mul, h.pow_eq_one, one_pow, PNat.mul_coe]⟩ #align is_primitive_root.pow_eq_one_iff_dvd IsPrimitiveRoot.pow_eq_one_iff_dvd theorem isUnit (h : IsPrimitiveRoot ζ k) (h0 : 0 < k) : IsUnit ζ := by apply isUnit_of_mul_eq_one ζ (ζ ^ (k - 1)) rw [← pow_succ', tsub_add_cancel_of_le h0.nat_succ_le, h.pow_eq_one] #align is_primitive_root.is_unit IsPrimitiveRoot.isUnit theorem pow_ne_one_of_pos_of_lt (h0 : 0 < l) (hl : l < k) : ζ ^ l ≠ 1 := mt (Nat.le_of_dvd h0 ∘ h.dvd_of_pow_eq_one _) <\| not_le_of_lt hl #align is_primitive_root.pow_ne_one_of_pos_of_lt IsPrimitiveRoot.pow_ne_one_of_pos_of_lt theorem ne_one (hk : 1 < k) : ζ ≠ 1 := h.pow_ne_one_of_pos_of_lt zero_lt_one hk ∘ (pow_one ζ).trans #align is_primitive_root.ne_one IsPrimitiveRoot.ne_one theorem pow_inj (h : IsPrimitiveRoot ζ k) ⦃i j : ℕ⦄ (hi : i < k) (hj : j < k) (H : ζ ^ i = ζ ^ j) : i = j := by wlog hij : i ≤ j generalizing i j · exact (this hj hi H.symm (le_of_not_le hij)).symm apply le_antisymm hij rw [← tsub_eq_zero_iff_le] apply Nat.eq_zero_of_dvd_of_lt _ (lt_of_le_of_lt tsub_le_self hj) apply h.dvd_of_pow_eq_one rw [← ((h.isUnit (lt_of_le_of_lt (Nat.zero_le _) hi)).pow i).mul_left_inj, ← pow_add, tsub_add_cancel_of_le hij, H, one_mul] #align is_primitive_root.pow_inj IsPrimitiveRoot.pow_inj theorem one : IsPrimitiveRoot (1 : M) 1 := { pow_eq_one := pow_one _ dvd_of_pow_eq_one := fun _ _ => one_dvd _ } #align is_primitive_root.one IsPrimitiveRoot.one @[simp] theorem one_right_iff : IsPrimitiveRoot ζ 1 ↔ ζ = 1 := by clear h constructor · intro h; rw [← pow_one ζ, h.pow_eq_one] · rintro rfl; exact one #align is_primitive_root.one_right_iff IsPrimitiveRoot.one_right_iff @[simp] theorem coe_submonoidClass_iff {M B : Type} [CommMonoid M] [SetLike B M] [SubmonoidClass B M] {N : B} {ζ : N} : IsPrimitiveRoot (ζ : M) k ↔ IsPrimitiveRoot ζ k := by simp_rw [iff_def] norm_cast #align is_primitive_root.coe_submonoid_class_iff IsPrimitiveRoot.coe_submonoidClass_iff @[simp] theorem coe_units_iff {ζ : Mˣ} : IsPrimitiveRoot (ζ : M) k ↔ IsPrimitiveRoot ζ k := by simp only [iff_def, Units.ext_iff, Units.val_pow_eq_pow_val, Units.val_one] #align is_primitive_root.coe_units_iff IsPrimitiveRoot.coe_units_iff lemma isUnit_unit {ζ : M} {n} (hn) (hζ : IsPrimitiveRoot ζ n) : IsPrimitiveRoot (hζ.isUnit hn).unit n := coe_units_iff.mp hζ lemma isUnit_unit' {ζ : G} {n} (hn) (hζ : IsPrimitiveRoot ζ n) : IsPrimitiveRoot (hζ.isUnit hn).unit' n := coe_units_iff.mp hζ -- Porting note `variable` above already contains `(h : IsPrimitiveRoot ζ k)` theorem pow_of_coprime (i : ℕ) (hi : i.Coprime k) : IsPrimitiveRoot (ζ ^ i) k := by by_cases h0 : k = 0 · subst k; simp_all only [pow_one, Nat.coprime_zero_right] rcases h.isUnit (Nat.pos_of_ne_zero h0) with ⟨ζ, rfl⟩ rw [← Units.val_pow_eq_pow_val] rw [coe_units_iff] at h ⊢ refine { pow_eq_one := by rw [← pow_mul', pow_mul, h.pow_eq_one, one_pow] dvd_of_pow_eq_one := ?_ } intro l hl apply h.dvd_of_pow_eq_one rw [← pow_one ζ, ← zpow_natCast ζ, ← hi.gcd_eq_one, Nat.gcd_eq_gcd_ab, zpow_add, mul_pow, ← zpow_natCast, ← zpow_mul, mul_right_comm] simp only [zpow_mul, hl, h.pow_eq_one, one_zpow, one_pow, one_mul, zpow_natCast] #align is_primitive_root.pow_of_coprime IsPrimitiveRoot.pow_of_coprime theorem pow_of_prime (h : IsPrimitiveRoot ζ k) {p : ℕ} (hprime : Nat.Prime p) (hdiv : ¬p ∣ k) : IsPrimitiveRoot (ζ ^ p) k := h.pow_of_coprime p (hprime.coprime_iff_not_dvd.2 hdiv) #align is_primitive_root.pow_of_prime IsPrimitiveRoot.pow_of_prime theorem pow_iff_coprime (h : IsPrimitiveRoot ζ k) (h0 : 0 < k) (i : ℕ) : IsPrimitiveRoot (ζ ^ i) k ↔ i.Coprime k := by refine ⟨?_, h.pow_of_coprime i⟩ intro hi obtain ⟨a, ha⟩ := i.gcd_dvd_left k obtain ⟨b, hb⟩ := i.gcd_dvd_right k suffices b = k by -- Porting note: was `rwa [this, ← one_mul k, mul_left_inj' h0.ne', eq_comm] at hb` rw [this, eq_comm, Nat.mul_left_eq_self_iff h0] at hb rwa [Nat.Coprime] rw [ha] at hi rw [mul_comm] at hb apply Nat.dvd_antisymm ⟨i.gcd k, hb⟩ (hi.dvd_of_pow_eq_one b _) rw [← pow_mul', ← mul_assoc, ← hb, pow_mul, h.pow_eq_one, one_pow] #align is_primitive_root.pow_iff_coprime IsPrimitiveRoot.pow_iff_coprime protected theorem orderOf (ζ : M) : IsPrimitiveRoot ζ (orderOf ζ) := ⟨pow_orderOf_eq_one ζ, fun _ => orderOf_dvd_of_pow_eq_one⟩ #align is_primitive_root.order_of IsPrimitiveRoot.orderOf theorem unique {ζ : M} (hk : IsPrimitiveRoot ζ k) (hl : IsPrimitiveRoot ζ l) : k = l := Nat.dvd_antisymm (hk.2 _ hl.1) (hl.2 _ hk.1) #align is_primitive_root.unique IsPrimitiveRoot.unique theorem eq_orderOf : k = orderOf ζ := h.unique (IsPrimitiveRoot.orderOf ζ) #align is_primitive_root.eq_order_of IsPrimitiveRoot.eq_orderOf protected theorem iff (hk : 0 < k) : IsPrimitiveRoot ζ k ↔ ζ ^ k = 1 ∧ ∀ l : ℕ, 0 < l → l < k → ζ ^ l ≠ 1 := by refine ⟨fun h => ⟨h.pow_eq_one, fun l hl' hl => ?_⟩, fun ⟨hζ, hl⟩ => IsPrimitiveRoot.mk_of_lt ζ hk hζ hl⟩ rw [h.eq_orderOf] at hl exact pow_ne_one_of_lt_orderOf' hl'.ne' hl #align is_primitive_root.iff IsPrimitiveRoot.iff protected theorem not_iff : ¬IsPrimitiveRoot ζ k ↔ orderOf ζ ≠ k := ⟨fun h hk => h <\| hk ▸ IsPrimitiveRoot.orderOf ζ, fun h hk => h.symm <\| hk.unique <\| IsPrimitiveRoot.orderOf ζ⟩ #align is_primitive_root.not_iff IsPrimitiveRoot.not_iff theorem pow_mul_pow_lcm {ζ' : M} {k' : ℕ} (hζ : IsPrimitiveRoot ζ k) (hζ' : IsPrimitiveRoot ζ' k') (hk : k ≠ 0) (hk' : k' ≠ 0) : IsPrimitiveRoot (ζ ^ (k / Nat.factorizationLCMLeft k k') ζ' ^ (k' / Nat.factorizationLCMRight k k')) (Nat.lcm k k') := by convert IsPrimitiveRoot.orderOf _ convert ((Commute.all ζ ζ').orderOf_mul_pow_eq_lcm (by simpa [← hζ.eq_orderOf]) (by simpa [← hζ'.eq_orderOf])).symm using 2 all_goals simp [hζ.eq_orderOf, hζ'.eq_orderOf] theorem pow_of_dvd (h : IsPrimitiveRoot ζ k) {p : ℕ} (hp : p ≠ 0) (hdiv : p ∣ k) : IsPrimitiveRoot (ζ ^ p) (k / p) := by suffices orderOf (ζ ^ p) = k / p by exact this ▸ IsPrimitiveRoot.orderOf (ζ ^ p) rw [orderOf_pow' _ hp, ← eq_orderOf h, Nat.gcd_eq_right hdiv] #align is_primitive_root.pow_of_dvd IsPrimitiveRoot.pow_of_dvd protected theorem mem_rootsOfUnity {ζ : Mˣ} {n : ℕ+} (h : IsPrimitiveRoot ζ n) : ζ ∈ rootsOfUnity n M := h.pow_eq_one #align is_primitive_root.mem_roots_of_unity IsPrimitiveRoot.mem_rootsOfUnity theorem pow {n : ℕ} {a b : ℕ} (hn : 0 < n) (h : IsPrimitiveRoot ζ n) (hprod : n = a * b) : IsPrimitiveRoot (ζ ^ a) b := by subst n simp only [iff_def, ← pow_mul, h.pow_eq_one, eq_self_iff_true, true_and_iff] intro l hl -- Porting note: was `by rintro rfl; simpa only [Nat.not_lt_zero, zero_mul] using hn` have ha0 : a ≠ 0 := left_ne_zero_of_mul hn.ne' rw [← mul_dvd_mul_iff_left ha0] exact h.dvd_of_pow_eq_one _ hl #align is_primitive_root.pow IsPrimitiveRoot.pow lemma injOn_pow {n : ℕ} {ζ : M} (hζ : IsPrimitiveRoot ζ n) : Set.InjOn (ζ ^ ·) (Finset.range n) := by obtain (rfl\|hn) := n.eq_zero_or_pos; · simp intros i hi j hj e rw [Finset.coe_range, Set.mem_Iio] at hi hj have : (hζ.isUnit hn).unit ^ i = (hζ.isUnit hn).unit ^ j := Units.ext (by simpa using e) rw [pow_inj_mod, ← orderOf_injective ⟨⟨Units.val, Units.val_one⟩, Units.val_mul⟩ Units.ext (hζ.isUnit hn).unit] at this simpa [← hζ.eq_orderOf, Nat.mod_eq_of_lt, hi, hj] using this section IsDomain variable [CommRing R] variable {ζ : Rˣ} (h : IsPrimitiveRoot ζ k) theorem eq_neg_one_of_two_right [NoZeroDivisors R] {ζ : R} (h : IsPrimitiveRoot ζ 2) : ζ = -1 := by apply (eq_or_eq_neg_of_sq_eq_sq ζ 1 _).resolve_left · rw [← pow_one ζ]; apply h.pow_ne_one_of_pos_of_lt <;> decide · simp only [h.pow_eq_one, one_pow] #align is_primitive_root.eq_neg_one_of_two_right IsPrimitiveRoot.eq_neg_one_of_two_right	Mathlib/RingTheory/RootsOfUnity/Basic.lean	694	698	theorem neg_one (p : ℕ) [Nontrivial R] [h : CharP R p] (hp : p ≠ 2) : IsPrimitiveRoot (-1 : R) 2 := by	convert IsPrimitiveRoot.orderOf (-1 : R) rw [orderOf_neg_one, if_neg] rwa [ringChar.eq_iff.mpr h]
import Mathlib.Analysis.BoxIntegral.Basic import Mathlib.MeasureTheory.Integral.SetIntegral import Mathlib.Tactic.Generalize #align_import analysis.box_integral.integrability from "leanprover-community/mathlib"@"fd5edc43dc4f10b85abfe544b88f82cf13c5f844" open scoped Classical NNReal ENNReal Topology universe u v variable {ι : Type u} {E : Type v} [Fintype ι] [NormedAddCommGroup E] [NormedSpace ℝ E] open MeasureTheory Metric Set Finset Filter BoxIntegral namespace BoxIntegral theorem hasIntegralIndicatorConst (l : IntegrationParams) (hl : l.bRiemann = false) {s : Set (ι → ℝ)} (hs : MeasurableSet s) (I : Box ι) (y : E) (μ : Measure (ι → ℝ)) [IsLocallyFiniteMeasure μ] : HasIntegral.{u, v, v} I l (s.indicator fun _ => y) μ.toBoxAdditive.toSMul ((μ (s ∩ I)).toReal • y) := by refine HasIntegral.of_mul ‖y‖ fun ε ε0 => ?_ lift ε to ℝ≥0 using ε0.le; rw [NNReal.coe_pos] at ε0 have A : μ (s ∩ Box.Icc I) ≠ ∞ := ((measure_mono Set.inter_subset_right).trans_lt (I.measure_Icc_lt_top μ)).ne have B : μ (s ∩ I) ≠ ∞ := ((measure_mono Set.inter_subset_right).trans_lt (I.measure_coe_lt_top μ)).ne obtain ⟨F, hFs, hFc, hμF⟩ : ∃ F, F ⊆ s ∩ Box.Icc I ∧ IsClosed F ∧ μ ((s ∩ Box.Icc I) \ F) < ε := (hs.inter I.measurableSet_Icc).exists_isClosed_diff_lt A (ENNReal.coe_pos.2 ε0).ne' obtain ⟨U, hsU, hUo, hUt, hμU⟩ : ∃ U, s ∩ Box.Icc I ⊆ U ∧ IsOpen U ∧ μ U < ∞ ∧ μ (U \ (s ∩ Box.Icc I)) < ε := (hs.inter I.measurableSet_Icc).exists_isOpen_diff_lt A (ENNReal.coe_pos.2 ε0).ne' have : ∀ x ∈ s ∩ Box.Icc I, ∃ r : Ioi (0 : ℝ), closedBall x r ⊆ U := fun x hx => by rcases nhds_basis_closedBall.mem_iff.1 (hUo.mem_nhds <\| hsU hx) with ⟨r, hr₀, hr⟩ exact ⟨⟨r, hr₀⟩, hr⟩ choose! rs hrsU using this have : ∀ x ∈ Box.Icc I \ s, ∃ r : Ioi (0 : ℝ), closedBall x r ⊆ Fᶜ := fun x hx => by obtain ⟨r, hr₀, hr⟩ := nhds_basis_closedBall.mem_iff.1 (hFc.isOpen_compl.mem_nhds fun hx' => hx.2 (hFs hx').1) exact ⟨⟨r, hr₀⟩, hr⟩ choose! rs' hrs'F using this set r : (ι → ℝ) → Ioi (0 : ℝ) := s.piecewise rs rs' refine ⟨fun _ => r, fun c => l.rCond_of_bRiemann_eq_false hl, fun c π hπ hπp => ?_⟩; rw [mul_comm] dsimp [integralSum] simp only [mem_closedBall, dist_eq_norm, ← indicator_const_smul_apply, sum_indicator_eq_sum_filter, ← sum_smul, ← sub_smul, norm_smul, Real.norm_eq_abs, ← Prepartition.filter_boxes, ← Prepartition.measure_iUnion_toReal] gcongr set t := (π.filter (π.tag · ∈ s)).iUnion change abs ((μ t).toReal - (μ (s ∩ I)).toReal) ≤ ε have htU : t ⊆ U ∩ I := by simp only [t, TaggedPrepartition.iUnion_def, iUnion_subset_iff, TaggedPrepartition.mem_filter, and_imp] refine fun J hJ hJs x hx => ⟨hrsU _ ⟨hJs, π.tag_mem_Icc J⟩ ?_, π.le_of_mem' J hJ hx⟩ simpa only [r, s.piecewise_eq_of_mem _ _ hJs] using hπ.1 J hJ (Box.coe_subset_Icc hx) refine abs_sub_le_iff.2 ⟨?_, ?_⟩ · refine (ENNReal.le_toReal_sub B).trans (ENNReal.toReal_le_coe_of_le_coe ?_) refine (tsub_le_tsub (measure_mono htU) le_rfl).trans (le_measure_diff.trans ?_) refine (measure_mono fun x hx => ?_).trans hμU.le exact ⟨hx.1.1, fun hx' => hx.2 ⟨hx'.1, hx.1.2⟩⟩ · have hμt : μ t ≠ ∞ := ((measure_mono (htU.trans inter_subset_left)).trans_lt hUt).ne refine (ENNReal.le_toReal_sub hμt).trans (ENNReal.toReal_le_coe_of_le_coe ?_) refine le_measure_diff.trans ((measure_mono ?_).trans hμF.le) rintro x ⟨⟨hxs, hxI⟩, hxt⟩ refine ⟨⟨hxs, Box.coe_subset_Icc hxI⟩, fun hxF => hxt ?_⟩ simp only [t, TaggedPrepartition.iUnion_def, TaggedPrepartition.mem_filter, Set.mem_iUnion] rcases hπp x hxI with ⟨J, hJπ, hxJ⟩ refine ⟨J, ⟨hJπ, ?_⟩, hxJ⟩ contrapose hxF refine hrs'F _ ⟨π.tag_mem_Icc J, hxF⟩ ?_ simpa only [r, s.piecewise_eq_of_not_mem _ _ hxF] using hπ.1 J hJπ (Box.coe_subset_Icc hxJ) #align box_integral.has_integral_indicator_const BoxIntegral.hasIntegralIndicatorConst	Mathlib/Analysis/BoxIntegral/Integrability.lean	104	155	theorem HasIntegral.of_aeEq_zero {l : IntegrationParams} {I : Box ι} {f : (ι → ℝ) → E} {μ : Measure (ι → ℝ)} [IsLocallyFiniteMeasure μ] (hf : f =ᵐ[μ.restrict I] 0) (hl : l.bRiemann = false) : HasIntegral.{u, v, v} I l f μ.toBoxAdditive.toSMul 0 := by	/- Each set `{x \| n < ‖f x‖ ≤ n + 1}`, `n : ℕ`, has measure zero. We cover it by an open set of measure less than `ε / 2 ^ n / (n + 1)`. Then the norm of the integral sum is less than `ε`. -/ refine hasIntegral_iff.2 fun ε ε0 => ?_ lift ε to ℝ≥0 using ε0.lt.le; rw [gt_iff_lt, NNReal.coe_pos] at ε0 rcases NNReal.exists_pos_sum_of_countable ε0.ne' ℕ with ⟨δ, δ0, c, hδc, hcε⟩ haveI := Fact.mk (I.measure_coe_lt_top μ) change μ.restrict I {x \| f x ≠ 0} = 0 at hf set N : (ι → ℝ) → ℕ := fun x => ⌈‖f x‖⌉₊ have N0 : ∀ {x}, N x = 0 ↔ f x = 0 := by simp [N] have : ∀ n, ∃ U, N ⁻¹' {n} ⊆ U ∧ IsOpen U ∧ μ.restrict I U < δ n / n := fun n ↦ by refine (N ⁻¹' {n}).exists_isOpen_lt_of_lt _ ?_ cases' n with n · simpa [ENNReal.div_zero (ENNReal.coe_pos.2 (δ0 _)).ne'] using measure_lt_top (μ.restrict I) _ · refine (measure_mono_null ?_ hf).le.trans_lt ?_ · exact fun x hxN hxf => n.succ_ne_zero ((Eq.symm hxN).trans <\| N0.2 hxf) · simp [(δ0 _).ne'] choose U hNU hUo hμU using this have : ∀ x, ∃ r : Ioi (0 : ℝ), closedBall x r ⊆ U (N x) := fun x => by obtain ⟨r, hr₀, hr⟩ := nhds_basis_closedBall.mem_iff.1 ((hUo _).mem_nhds (hNU _ rfl)) exact ⟨⟨r, hr₀⟩, hr⟩ choose r hrU using this refine ⟨fun _ => r, fun c => l.rCond_of_bRiemann_eq_false hl, fun c π hπ _ => ?_⟩ rw [dist_eq_norm, sub_zero, ← integralSum_fiberwise fun J => N (π.tag J)] refine le_trans ?_ (NNReal.coe_lt_coe.2 hcε).le refine (norm_sum_le_of_le _ ?_).trans (sum_le_hasSum _ (fun n _ => (δ n).2) (NNReal.hasSum_coe.2 hδc)) rintro n - dsimp [integralSum] have : ∀ J ∈ π.filter fun J => N (π.tag J) = n, ‖(μ ↑J).toReal • f (π.tag J)‖ ≤ (μ J).toReal * n := fun J hJ ↦ by rw [TaggedPrepartition.mem_filter] at hJ rw [norm_smul, Real.norm_eq_abs, abs_of_nonneg ENNReal.toReal_nonneg] gcongr exact hJ.2 ▸ Nat.le_ceil _ refine (norm_sum_le_of_le _ this).trans ?_; clear this rw [← sum_mul, ← Prepartition.measure_iUnion_toReal] let m := μ (π.filter fun J => N (π.tag J) = n).iUnion show m.toReal * ↑n ≤ ↑(δ n) have : m < δ n / n := by simp only [Measure.restrict_apply (hUo _).measurableSet] at hμU refine (measure_mono ?_).trans_lt (hμU _) simp only [Set.subset_def, TaggedPrepartition.mem_iUnion, TaggedPrepartition.mem_filter] rintro x ⟨J, ⟨hJ, rfl⟩, hx⟩ exact ⟨hrU _ (hπ.1 _ hJ (Box.coe_subset_Icc hx)), π.le_of_mem' J hJ hx⟩ clear_value m lift m to ℝ≥0 using ne_top_of_lt this rw [ENNReal.coe_toReal, ← NNReal.coe_natCast, ← NNReal.coe_mul, NNReal.coe_le_coe, ← ENNReal.coe_le_coe, ENNReal.coe_mul, ENNReal.coe_natCast, mul_comm] exact (mul_le_mul_left' this.le _).trans ENNReal.mul_div_le
import Mathlib.LinearAlgebra.TensorProduct.Basic import Mathlib.RingTheory.Finiteness open scoped TensorProduct open Submodule variable {R M N : Type*} variable [CommSemiring R] [AddCommMonoid M] [AddCommMonoid N] [Module R M] [Module R N] variable {M₁ M₂ : Submodule R M} {N₁ N₂ : Submodule R N} namespace TensorProduct theorem exists_multiset (x : M ⊗[R] N) : ∃ S : Multiset (M × N), x = (S.map fun i ↦ i.1 ⊗ₜ[R] i.2).sum := by induction x using TensorProduct.induction_on with \| zero => exact ⟨0, by simp⟩ \| tmul x y => exact ⟨{(x, y)}, by simp⟩ \| add x y hx hy => obtain ⟨Sx, hx⟩ := hx obtain ⟨Sy, hy⟩ := hy exact ⟨Sx + Sy, by rw [Multiset.map_add, Multiset.sum_add, hx, hy]⟩ theorem exists_finsupp_left (x : M ⊗[R] N) : ∃ S : M →₀ N, x = S.sum fun m n ↦ m ⊗ₜ[R] n := by induction x using TensorProduct.induction_on with \| zero => exact ⟨0, by simp⟩ \| tmul x y => exact ⟨Finsupp.single x y, by simp⟩ \| add x y hx hy => obtain ⟨Sx, hx⟩ := hx obtain ⟨Sy, hy⟩ := hy use Sx + Sy rw [hx, hy] exact (Finsupp.sum_add_index' (by simp) TensorProduct.tmul_add).symm theorem exists_finsupp_right (x : M ⊗[R] N) : ∃ S : N →₀ M, x = S.sum fun n m ↦ m ⊗ₜ[R] n := by obtain ⟨S, h⟩ := exists_finsupp_left (TensorProduct.comm R M N x) refine ⟨S, (TensorProduct.comm R M N).injective ?_⟩ simp_rw [h, Finsupp.sum, map_sum, comm_tmul] theorem exists_finset (x : M ⊗[R] N) : ∃ S : Finset (M × N), x = S.sum fun i ↦ i.1 ⊗ₜ[R] i.2 := by obtain ⟨S, h⟩ := exists_finsupp_left x use S.graph rw [h, Finsupp.sum] apply Finset.sum_nbij' (fun m ↦ ⟨m, S m⟩) Prod.fst <;> simp theorem exists_finite_submodule_of_finite (s : Set (M ⊗[R] N)) (hs : s.Finite) : ∃ (M' : Submodule R M) (N' : Submodule R N), Module.Finite R M' ∧ Module.Finite R N' ∧ s ⊆ LinearMap.range (mapIncl M' N') := by simp_rw [Module.Finite.iff_fg] refine hs.induction_on ⟨_, _, fg_bot, fg_bot, Set.empty_subset _⟩ ?_ rintro a s - - ⟨M', N', hM', hN', h⟩ refine TensorProduct.induction_on a ?_ (fun x y ↦ ?_) fun x y hx hy ↦ ?_ · exact ⟨M', N', hM', hN', Set.insert_subset (zero_mem _) h⟩ · refine ⟨_, _, hM'.sup (fg_span_singleton x), hN'.sup (fg_span_singleton y), Set.insert_subset ?_ fun z hz ↦ ?_⟩ · exact ⟨⟨x, mem_sup_right (mem_span_singleton_self x)⟩ ⊗ₜ ⟨y, mem_sup_right (mem_span_singleton_self y)⟩, rfl⟩ · exact range_mapIncl_mono le_sup_left le_sup_left (h hz) · obtain ⟨M₁', N₁', hM₁', hN₁', h₁⟩ := hx obtain ⟨M₂', N₂', hM₂', hN₂', h₂⟩ := hy refine ⟨_, _, hM₁'.sup hM₂', hN₁'.sup hN₂', Set.insert_subset (add_mem ?_ ?_) fun z hz ↦ ?_⟩ · exact range_mapIncl_mono le_sup_left le_sup_left (h₁ (Set.mem_insert x s)) · exact range_mapIncl_mono le_sup_right le_sup_right (h₂ (Set.mem_insert y s)) · exact range_mapIncl_mono le_sup_left le_sup_left (h₁ (Set.subset_insert x s hz)) theorem exists_finite_submodule_left_of_finite (s : Set (M ⊗[R] N)) (hs : s.Finite) : ∃ M' : Submodule R M, Module.Finite R M' ∧ s ⊆ LinearMap.range (M'.subtype.rTensor N) := by obtain ⟨M', _, hfin, _, h⟩ := exists_finite_submodule_of_finite s hs refine ⟨M', hfin, ?_⟩ rw [mapIncl, ← LinearMap.rTensor_comp_lTensor] at h exact h.trans (LinearMap.range_comp_le_range _ _) theorem exists_finite_submodule_right_of_finite (s : Set (M ⊗[R] N)) (hs : s.Finite) : ∃ N' : Submodule R N, Module.Finite R N' ∧ s ⊆ LinearMap.range (N'.subtype.lTensor M) := by obtain ⟨_, N', _, hfin, h⟩ := exists_finite_submodule_of_finite s hs refine ⟨N', hfin, ?_⟩ rw [mapIncl, ← LinearMap.lTensor_comp_rTensor] at h exact h.trans (LinearMap.range_comp_le_range _ _)	Mathlib/LinearAlgebra/TensorProduct/Finiteness.lean	140	152	theorem exists_finite_submodule_of_finite' (s : Set (M₁ ⊗[R] N₁)) (hs : s.Finite) : ∃ (M' : Submodule R M) (N' : Submodule R N) (hM : M' ≤ M₁) (hN : N' ≤ N₁), Module.Finite R M' ∧ Module.Finite R N' ∧ s ⊆ LinearMap.range (TensorProduct.map (inclusion hM) (inclusion hN)) := by	obtain ⟨M', N', _, _, h⟩ := exists_finite_submodule_of_finite s hs have hM := map_subtype_le M₁ M' have hN := map_subtype_le N₁ N' refine ⟨_, _, hM, hN, .map _ _, .map _ _, ?_⟩ rw [mapIncl, show M'.subtype = inclusion hM ∘ₗ M₁.subtype.submoduleMap M' by ext; simp, show N'.subtype = inclusion hN ∘ₗ N₁.subtype.submoduleMap N' by ext; simp, map_comp] at h exact h.trans (LinearMap.range_comp_le_range _ _)
import Mathlib.Geometry.Manifold.MFDeriv.Defs #align_import geometry.manifold.mfderiv from "leanprover-community/mathlib"@"e473c3198bb41f68560cab68a0529c854b618833" noncomputable section open scoped Topology Manifold open Set Bundle section DerivativesProperties variable {𝕜 : Type} [NontriviallyNormedField 𝕜] {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {H : Type} [TopologicalSpace H] (I : ModelWithCorners 𝕜 E H) {M : Type} [TopologicalSpace M] [ChartedSpace H M] {E' : Type} [NormedAddCommGroup E'] [NormedSpace 𝕜 E'] {H' : Type} [TopologicalSpace H'] {I' : ModelWithCorners 𝕜 E' H'} {M' : Type} [TopologicalSpace M'] [ChartedSpace H' M'] {E'' : Type} [NormedAddCommGroup E''] [NormedSpace 𝕜 E''] {H'' : Type} [TopologicalSpace H''] {I'' : ModelWithCorners 𝕜 E'' H''} {M'' : Type} [TopologicalSpace M''] [ChartedSpace H'' M''] {f f₀ f₁ : M → M'} {x : M} {s t : Set M} {g : M' → M''} {u : Set M'} theorem uniqueMDiffWithinAt_univ : UniqueMDiffWithinAt I univ x := by unfold UniqueMDiffWithinAt simp only [preimage_univ, univ_inter] exact I.unique_diff _ (mem_range_self _) #align unique_mdiff_within_at_univ uniqueMDiffWithinAt_univ variable {I} theorem uniqueMDiffWithinAt_iff {s : Set M} {x : M} : UniqueMDiffWithinAt I s x ↔ UniqueDiffWithinAt 𝕜 ((extChartAt I x).symm ⁻¹' s ∩ (extChartAt I x).target) ((extChartAt I x) x) := by apply uniqueDiffWithinAt_congr rw [nhdsWithin_inter, nhdsWithin_inter, nhdsWithin_extChartAt_target_eq] #align unique_mdiff_within_at_iff uniqueMDiffWithinAt_iff nonrec theorem UniqueMDiffWithinAt.mono_nhds {s t : Set M} {x : M} (hs : UniqueMDiffWithinAt I s x) (ht : 𝓝[s] x ≤ 𝓝[t] x) : UniqueMDiffWithinAt I t x := hs.mono_nhds <\| by simpa only [← map_extChartAt_nhdsWithin] using Filter.map_mono ht theorem UniqueMDiffWithinAt.mono_of_mem {s t : Set M} {x : M} (hs : UniqueMDiffWithinAt I s x) (ht : t ∈ 𝓝[s] x) : UniqueMDiffWithinAt I t x := hs.mono_nhds (nhdsWithin_le_iff.2 ht) theorem UniqueMDiffWithinAt.mono (h : UniqueMDiffWithinAt I s x) (st : s ⊆ t) : UniqueMDiffWithinAt I t x := UniqueDiffWithinAt.mono h <\| inter_subset_inter (preimage_mono st) (Subset.refl _) #align unique_mdiff_within_at.mono UniqueMDiffWithinAt.mono theorem UniqueMDiffWithinAt.inter' (hs : UniqueMDiffWithinAt I s x) (ht : t ∈ 𝓝[s] x) : UniqueMDiffWithinAt I (s ∩ t) x := hs.mono_of_mem (Filter.inter_mem self_mem_nhdsWithin ht) #align unique_mdiff_within_at.inter' UniqueMDiffWithinAt.inter' theorem UniqueMDiffWithinAt.inter (hs : UniqueMDiffWithinAt I s x) (ht : t ∈ 𝓝 x) : UniqueMDiffWithinAt I (s ∩ t) x := hs.inter' (nhdsWithin_le_nhds ht) #align unique_mdiff_within_at.inter UniqueMDiffWithinAt.inter theorem IsOpen.uniqueMDiffWithinAt (hs : IsOpen s) (xs : x ∈ s) : UniqueMDiffWithinAt I s x := (uniqueMDiffWithinAt_univ I).mono_of_mem <\| nhdsWithin_le_nhds <\| hs.mem_nhds xs #align is_open.unique_mdiff_within_at IsOpen.uniqueMDiffWithinAt theorem UniqueMDiffOn.inter (hs : UniqueMDiffOn I s) (ht : IsOpen t) : UniqueMDiffOn I (s ∩ t) := fun _x hx => UniqueMDiffWithinAt.inter (hs _ hx.1) (ht.mem_nhds hx.2) #align unique_mdiff_on.inter UniqueMDiffOn.inter theorem IsOpen.uniqueMDiffOn (hs : IsOpen s) : UniqueMDiffOn I s := fun _x hx => hs.uniqueMDiffWithinAt hx #align is_open.unique_mdiff_on IsOpen.uniqueMDiffOn theorem uniqueMDiffOn_univ : UniqueMDiffOn I (univ : Set M) := isOpen_univ.uniqueMDiffOn #align unique_mdiff_on_univ uniqueMDiffOn_univ variable [Is : SmoothManifoldWithCorners I M] [I's : SmoothManifoldWithCorners I' M'] [I''s : SmoothManifoldWithCorners I'' M''] {f' f₀' f₁' : TangentSpace I x →L[𝕜] TangentSpace I' (f x)} {g' : TangentSpace I' (f x) →L[𝕜] TangentSpace I'' (g (f x))} nonrec theorem UniqueMDiffWithinAt.eq (U : UniqueMDiffWithinAt I s x) (h : HasMFDerivWithinAt I I' f s x f') (h₁ : HasMFDerivWithinAt I I' f s x f₁') : f' = f₁' := by -- Porting note: didn't need `convert` because of finding instances by unification convert U.eq h.2 h₁.2 #align unique_mdiff_within_at.eq UniqueMDiffWithinAt.eq theorem UniqueMDiffOn.eq (U : UniqueMDiffOn I s) (hx : x ∈ s) (h : HasMFDerivWithinAt I I' f s x f') (h₁ : HasMFDerivWithinAt I I' f s x f₁') : f' = f₁' := UniqueMDiffWithinAt.eq (U _ hx) h h₁ #align unique_mdiff_on.eq UniqueMDiffOn.eq nonrec theorem UniqueMDiffWithinAt.prod {x : M} {y : M'} {s t} (hs : UniqueMDiffWithinAt I s x) (ht : UniqueMDiffWithinAt I' t y) : UniqueMDiffWithinAt (I.prod I') (s ×ˢ t) (x, y) := by refine (hs.prod ht).mono ?_ rw [ModelWithCorners.range_prod, ← prod_inter_prod] rfl theorem UniqueMDiffOn.prod {s : Set M} {t : Set M'} (hs : UniqueMDiffOn I s) (ht : UniqueMDiffOn I' t) : UniqueMDiffOn (I.prod I') (s ×ˢ t) := fun x h ↦ (hs x.1 h.1).prod (ht x.2 h.2) theorem mdifferentiableWithinAt_iff {f : M → M'} {s : Set M} {x : M} : MDifferentiableWithinAt I I' f s x ↔ ContinuousWithinAt f s x ∧ DifferentiableWithinAt 𝕜 (writtenInExtChartAt I I' x f) ((extChartAt I x).target ∩ (extChartAt I x).symm ⁻¹' s) ((extChartAt I x) x) := by rw [mdifferentiableWithinAt_iff'] refine and_congr Iff.rfl (exists_congr fun f' => ?_) rw [inter_comm] simp only [HasFDerivWithinAt, nhdsWithin_inter, nhdsWithin_extChartAt_target_eq] #align mdifferentiable_within_at_iff mdifferentiableWithinAt_iff theorem mdifferentiableWithinAt_iff_of_mem_source {x' : M} {y : M'} (hx : x' ∈ (chartAt H x).source) (hy : f x' ∈ (chartAt H' y).source) : MDifferentiableWithinAt I I' f s x' ↔ ContinuousWithinAt f s x' ∧ DifferentiableWithinAt 𝕜 (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).symm ⁻¹' s ∩ Set.range I) ((extChartAt I x) x') := (differentiable_within_at_localInvariantProp I I').liftPropWithinAt_indep_chart (StructureGroupoid.chart_mem_maximalAtlas _ x) hx (StructureGroupoid.chart_mem_maximalAtlas _ y) hy #align mdifferentiable_within_at_iff_of_mem_source mdifferentiableWithinAt_iff_of_mem_source theorem mfderivWithin_zero_of_not_mdifferentiableWithinAt (h : ¬MDifferentiableWithinAt I I' f s x) : mfderivWithin I I' f s x = 0 := by simp only [mfderivWithin, h, if_neg, not_false_iff] #align mfderiv_within_zero_of_not_mdifferentiable_within_at mfderivWithin_zero_of_not_mdifferentiableWithinAt theorem mfderiv_zero_of_not_mdifferentiableAt (h : ¬MDifferentiableAt I I' f x) : mfderiv I I' f x = 0 := by simp only [mfderiv, h, if_neg, not_false_iff] #align mfderiv_zero_of_not_mdifferentiable_at mfderiv_zero_of_not_mdifferentiableAt theorem HasMFDerivWithinAt.mono (h : HasMFDerivWithinAt I I' f t x f') (hst : s ⊆ t) : HasMFDerivWithinAt I I' f s x f' := ⟨ContinuousWithinAt.mono h.1 hst, HasFDerivWithinAt.mono h.2 (inter_subset_inter (preimage_mono hst) (Subset.refl _))⟩ #align has_mfderiv_within_at.mono HasMFDerivWithinAt.mono theorem HasMFDerivAt.hasMFDerivWithinAt (h : HasMFDerivAt I I' f x f') : HasMFDerivWithinAt I I' f s x f' := ⟨ContinuousAt.continuousWithinAt h.1, HasFDerivWithinAt.mono h.2 inter_subset_right⟩ #align has_mfderiv_at.has_mfderiv_within_at HasMFDerivAt.hasMFDerivWithinAt theorem HasMFDerivWithinAt.mdifferentiableWithinAt (h : HasMFDerivWithinAt I I' f s x f') : MDifferentiableWithinAt I I' f s x := ⟨h.1, ⟨f', h.2⟩⟩ #align has_mfderiv_within_at.mdifferentiable_within_at HasMFDerivWithinAt.mdifferentiableWithinAt theorem HasMFDerivAt.mdifferentiableAt (h : HasMFDerivAt I I' f x f') : MDifferentiableAt I I' f x := by rw [mdifferentiableAt_iff] exact ⟨h.1, ⟨f', h.2⟩⟩ #align has_mfderiv_at.mdifferentiable_at HasMFDerivAt.mdifferentiableAt @[simp, mfld_simps] theorem hasMFDerivWithinAt_univ : HasMFDerivWithinAt I I' f univ x f' ↔ HasMFDerivAt I I' f x f' := by simp only [HasMFDerivWithinAt, HasMFDerivAt, continuousWithinAt_univ, mfld_simps] #align has_mfderiv_within_at_univ hasMFDerivWithinAt_univ theorem hasMFDerivAt_unique (h₀ : HasMFDerivAt I I' f x f₀') (h₁ : HasMFDerivAt I I' f x f₁') : f₀' = f₁' := by rw [← hasMFDerivWithinAt_univ] at h₀ h₁ exact (uniqueMDiffWithinAt_univ I).eq h₀ h₁ #align has_mfderiv_at_unique hasMFDerivAt_unique theorem hasMFDerivWithinAt_inter' (h : t ∈ 𝓝[s] x) : HasMFDerivWithinAt I I' f (s ∩ t) x f' ↔ HasMFDerivWithinAt I I' f s x f' := by rw [HasMFDerivWithinAt, HasMFDerivWithinAt, extChartAt_preimage_inter_eq, hasFDerivWithinAt_inter', continuousWithinAt_inter' h] exact extChartAt_preimage_mem_nhdsWithin I h #align has_mfderiv_within_at_inter' hasMFDerivWithinAt_inter' theorem hasMFDerivWithinAt_inter (h : t ∈ 𝓝 x) : HasMFDerivWithinAt I I' f (s ∩ t) x f' ↔ HasMFDerivWithinAt I I' f s x f' := by rw [HasMFDerivWithinAt, HasMFDerivWithinAt, extChartAt_preimage_inter_eq, hasFDerivWithinAt_inter, continuousWithinAt_inter h] exact extChartAt_preimage_mem_nhds I h #align has_mfderiv_within_at_inter hasMFDerivWithinAt_inter theorem HasMFDerivWithinAt.union (hs : HasMFDerivWithinAt I I' f s x f') (ht : HasMFDerivWithinAt I I' f t x f') : HasMFDerivWithinAt I I' f (s ∪ t) x f' := by constructor · exact ContinuousWithinAt.union hs.1 ht.1 · convert HasFDerivWithinAt.union hs.2 ht.2 using 1 simp only [union_inter_distrib_right, preimage_union] #align has_mfderiv_within_at.union HasMFDerivWithinAt.union theorem HasMFDerivWithinAt.mono_of_mem (h : HasMFDerivWithinAt I I' f s x f') (ht : s ∈ 𝓝[t] x) : HasMFDerivWithinAt I I' f t x f' := (hasMFDerivWithinAt_inter' ht).1 (h.mono inter_subset_right) #align has_mfderiv_within_at.nhds_within HasMFDerivWithinAt.mono_of_mem theorem HasMFDerivWithinAt.hasMFDerivAt (h : HasMFDerivWithinAt I I' f s x f') (hs : s ∈ 𝓝 x) : HasMFDerivAt I I' f x f' := by rwa [← univ_inter s, hasMFDerivWithinAt_inter hs, hasMFDerivWithinAt_univ] at h #align has_mfderiv_within_at.has_mfderiv_at HasMFDerivWithinAt.hasMFDerivAt theorem MDifferentiableWithinAt.hasMFDerivWithinAt (h : MDifferentiableWithinAt I I' f s x) : HasMFDerivWithinAt I I' f s x (mfderivWithin I I' f s x) := by refine ⟨h.1, ?_⟩ simp only [mfderivWithin, h, if_pos, mfld_simps] exact DifferentiableWithinAt.hasFDerivWithinAt h.2 #align mdifferentiable_within_at.has_mfderiv_within_at MDifferentiableWithinAt.hasMFDerivWithinAt protected theorem MDifferentiableWithinAt.mfderivWithin (h : MDifferentiableWithinAt I I' f s x) : mfderivWithin I I' f s x = fderivWithin 𝕜 (writtenInExtChartAt I I' x f : _) ((extChartAt I x).symm ⁻¹' s ∩ range I) ((extChartAt I x) x) := by simp only [mfderivWithin, h, if_pos] #align mdifferentiable_within_at.mfderiv_within MDifferentiableWithinAt.mfderivWithin	Mathlib/Geometry/Manifold/MFDeriv/Basic.lean	250	254	theorem MDifferentiableAt.hasMFDerivAt (h : MDifferentiableAt I I' f x) : HasMFDerivAt I I' f x (mfderiv I I' f x) := by	refine ⟨h.continuousAt, ?_⟩ simp only [mfderiv, h, if_pos, mfld_simps] exact DifferentiableWithinAt.hasFDerivWithinAt h.differentiableWithinAt_writtenInExtChartAt
import Mathlib.Algebra.Polynomial.AlgebraMap import Mathlib.Algebra.Polynomial.Monic #align_import data.polynomial.lifts from "leanprover-community/mathlib"@"63417e01fbc711beaf25fa73b6edb395c0cfddd0" open Polynomial noncomputable section namespace Polynomial universe u v w section Semiring variable {R : Type u} [Semiring R] {S : Type v} [Semiring S] {f : R →+* S} def lifts (f : R →+* S) : Subsemiring S[X] := RingHom.rangeS (mapRingHom f) #align polynomial.lifts Polynomial.lifts theorem mem_lifts (p : S[X]) : p ∈ lifts f ↔ ∃ q : R[X], map f q = p := by simp only [coe_mapRingHom, lifts, RingHom.mem_rangeS] #align polynomial.mem_lifts Polynomial.mem_lifts theorem lifts_iff_set_range (p : S[X]) : p ∈ lifts f ↔ p ∈ Set.range (map f) := by simp only [coe_mapRingHom, lifts, Set.mem_range, RingHom.mem_rangeS] #align polynomial.lifts_iff_set_range Polynomial.lifts_iff_set_range theorem lifts_iff_ringHom_rangeS (p : S[X]) : p ∈ lifts f ↔ p ∈ (mapRingHom f).rangeS := by simp only [coe_mapRingHom, lifts, Set.mem_range, RingHom.mem_rangeS] #align polynomial.lifts_iff_ring_hom_srange Polynomial.lifts_iff_ringHom_rangeS theorem lifts_iff_coeff_lifts (p : S[X]) : p ∈ lifts f ↔ ∀ n : ℕ, p.coeff n ∈ Set.range f := by rw [lifts_iff_ringHom_rangeS, mem_map_rangeS f] rfl #align polynomial.lifts_iff_coeff_lifts Polynomial.lifts_iff_coeff_lifts theorem C_mem_lifts (f : R →+* S) (r : R) : C (f r) ∈ lifts f := ⟨C r, by simp only [coe_mapRingHom, map_C, Set.mem_univ, Subsemiring.coe_top, eq_self_iff_true, and_self_iff]⟩ set_option linter.uppercaseLean3 false in #align polynomial.C_mem_lifts Polynomial.C_mem_lifts	Mathlib/Algebra/Polynomial/Lifts.lean	87	91	theorem C'_mem_lifts {f : R →+* S} {s : S} (h : s ∈ Set.range f) : C s ∈ lifts f := by	obtain ⟨r, rfl⟩ := Set.mem_range.1 h use C r simp only [coe_mapRingHom, map_C, Set.mem_univ, Subsemiring.coe_top, eq_self_iff_true, and_self_iff]
import Mathlib.Algebra.Polynomial.Div import Mathlib.RingTheory.Polynomial.Basic import Mathlib.RingTheory.Ideal.QuotientOperations #align_import ring_theory.polynomial.quotient from "leanprover-community/mathlib"@"4f840b8d28320b20c87db17b3a6eef3d325fca87" set_option linter.uppercaseLean3 false open Polynomial namespace MvPolynomial variable {R : Type} {σ : Type} [CommRing R] {r : R}	Mathlib/RingTheory/Polynomial/Quotient.lean	205	209	theorem quotient_map_C_eq_zero {I : Ideal R} {i : R} (hi : i ∈ I) : (Ideal.Quotient.mk (Ideal.map (C : R →+* MvPolynomial σ R) I : Ideal (MvPolynomial σ R))).comp C i = 0 := by	simp only [Function.comp_apply, RingHom.coe_comp, Ideal.Quotient.eq_zero_iff_mem] exact Ideal.mem_map_of_mem _ hi
import Mathlib.Analysis.Calculus.Deriv.Basic import Mathlib.MeasureTheory.Constructions.BorelSpace.ContinuousLinearMap import Mathlib.MeasureTheory.Covering.BesicovitchVectorSpace import Mathlib.MeasureTheory.Measure.Lebesgue.EqHaar import Mathlib.Analysis.NormedSpace.Pointwise import Mathlib.MeasureTheory.Constructions.Polish import Mathlib.Analysis.Calculus.InverseFunctionTheorem.ApproximatesLinearOn #align_import measure_theory.function.jacobian from "leanprover-community/mathlib"@"b84aee748341da06a6d78491367e2c0e9f15e8a5" open MeasureTheory MeasureTheory.Measure Metric Filter Set FiniteDimensional Asymptotics TopologicalSpace open scoped NNReal ENNReal Topology Pointwise variable {E F : Type} [NormedAddCommGroup E] [NormedSpace ℝ E] [FiniteDimensional ℝ E] [NormedAddCommGroup F] [NormedSpace ℝ F] {s : Set E} {f : E → E} {f' : E → E →L[ℝ] E} theorem exists_closed_cover_approximatesLinearOn_of_hasFDerivWithinAt [SecondCountableTopology F] (f : E → F) (s : Set E) (f' : E → E →L[ℝ] F) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (r : (E →L[ℝ] F) → ℝ≥0) (rpos : ∀ A, r A ≠ 0) : ∃ (t : ℕ → Set E) (A : ℕ → E →L[ℝ] F), (∀ n, IsClosed (t n)) ∧ (s ⊆ ⋃ n, t n) ∧ (∀ n, ApproximatesLinearOn f (A n) (s ∩ t n) (r (A n))) ∧ (s.Nonempty → ∀ n, ∃ y ∈ s, A n = f' y) := by -- exclude the trivial case where `s` is empty rcases eq_empty_or_nonempty s with (rfl \| hs) · refine ⟨fun _ => ∅, fun _ => 0, ?_, ?_, ?_, ?_⟩ <;> simp -- we will use countably many linear maps. Select these from all the derivatives since the -- space of linear maps is second-countable obtain ⟨T, T_count, hT⟩ : ∃ T : Set s, T.Countable ∧ ⋃ x ∈ T, ball (f' (x : E)) (r (f' x)) = ⋃ x : s, ball (f' x) (r (f' x)) := TopologicalSpace.isOpen_iUnion_countable _ fun x => isOpen_ball -- fix a sequence `u` of positive reals tending to zero. obtain ⟨u, _, u_pos, u_lim⟩ : ∃ u : ℕ → ℝ, StrictAnti u ∧ (∀ n : ℕ, 0 < u n) ∧ Tendsto u atTop (𝓝 0) := exists_seq_strictAnti_tendsto (0 : ℝ) -- `M n z` is the set of points `x` such that `f y - f x` is close to `f' z (y - x)` for `y` -- in the ball of radius `u n` around `x`. let M : ℕ → T → Set E := fun n z => {x \| x ∈ s ∧ ∀ y ∈ s ∩ ball x (u n), ‖f y - f x - f' z (y - x)‖ ≤ r (f' z) ‖y - x‖} -- As `f` is differentiable everywhere on `s`, the sets `M n z` cover `s` by design. have s_subset : ∀ x ∈ s, ∃ (n : ℕ) (z : T), x ∈ M n z := by intro x xs obtain ⟨z, zT, hz⟩ : ∃ z ∈ T, f' x ∈ ball (f' (z : E)) (r (f' z)) := by have : f' x ∈ ⋃ z ∈ T, ball (f' (z : E)) (r (f' z)) := by rw [hT] refine mem_iUnion.2 ⟨⟨x, xs⟩, ?_⟩ simpa only [mem_ball, Subtype.coe_mk, dist_self] using (rpos (f' x)).bot_lt rwa [mem_iUnion₂, bex_def] at this obtain ⟨ε, εpos, hε⟩ : ∃ ε : ℝ, 0 < ε ∧ ‖f' x - f' z‖ + ε ≤ r (f' z) := by refine ⟨r (f' z) - ‖f' x - f' z‖, ?_, le_of_eq (by abel)⟩ simpa only [sub_pos] using mem_ball_iff_norm.mp hz obtain ⟨δ, δpos, hδ⟩ : ∃ (δ : ℝ), 0 < δ ∧ ball x δ ∩ s ⊆ {y \| ‖f y - f x - (f' x) (y - x)‖ ≤ ε * ‖y - x‖} := Metric.mem_nhdsWithin_iff.1 ((hf' x xs).isLittleO.def εpos) obtain ⟨n, hn⟩ : ∃ n, u n < δ := ((tendsto_order.1 u_lim).2 _ δpos).exists refine ⟨n, ⟨z, zT⟩, ⟨xs, ?_⟩⟩ intro y hy calc ‖f y - f x - (f' z) (y - x)‖ = ‖f y - f x - (f' x) (y - x) + (f' x - f' z) (y - x)‖ := by congr 1 simp only [ContinuousLinearMap.coe_sub', map_sub, Pi.sub_apply] abel _ ≤ ‖f y - f x - (f' x) (y - x)‖ + ‖(f' x - f' z) (y - x)‖ := norm_add_le _ _ _ ≤ ε * ‖y - x‖ + ‖f' x - f' z‖ * ‖y - x‖ := by refine add_le_add (hδ ?_) (ContinuousLinearMap.le_opNorm _ _) rw [inter_comm] exact inter_subset_inter_right _ (ball_subset_ball hn.le) hy _ ≤ r (f' z) * ‖y - x‖ := by rw [← add_mul, add_comm] gcongr -- the sets `M n z` are relatively closed in `s`, as all the conditions defining it are clearly -- closed have closure_M_subset : ∀ n z, s ∩ closure (M n z) ⊆ M n z := by rintro n z x ⟨xs, hx⟩ refine ⟨xs, fun y hy => ?_⟩ obtain ⟨a, aM, a_lim⟩ : ∃ a : ℕ → E, (∀ k, a k ∈ M n z) ∧ Tendsto a atTop (𝓝 x) := mem_closure_iff_seq_limit.1 hx have L1 : Tendsto (fun k : ℕ => ‖f y - f (a k) - (f' z) (y - a k)‖) atTop (𝓝 ‖f y - f x - (f' z) (y - x)‖) := by apply Tendsto.norm have L : Tendsto (fun k => f (a k)) atTop (𝓝 (f x)) := by apply (hf' x xs).continuousWithinAt.tendsto.comp apply tendsto_nhdsWithin_of_tendsto_nhds_of_eventually_within _ a_lim exact eventually_of_forall fun k => (aM k).1 apply Tendsto.sub (tendsto_const_nhds.sub L) exact ((f' z).continuous.tendsto _).comp (tendsto_const_nhds.sub a_lim) have L2 : Tendsto (fun k : ℕ => (r (f' z) : ℝ) * ‖y - a k‖) atTop (𝓝 (r (f' z) * ‖y - x‖)) := (tendsto_const_nhds.sub a_lim).norm.const_mul _ have I : ∀ᶠ k in atTop, ‖f y - f (a k) - (f' z) (y - a k)‖ ≤ r (f' z) * ‖y - a k‖ := by have L : Tendsto (fun k => dist y (a k)) atTop (𝓝 (dist y x)) := tendsto_const_nhds.dist a_lim filter_upwards [(tendsto_order.1 L).2 _ hy.2] intro k hk exact (aM k).2 y ⟨hy.1, hk⟩ exact le_of_tendsto_of_tendsto L1 L2 I -- choose a dense sequence `d p` rcases TopologicalSpace.exists_dense_seq E with ⟨d, hd⟩ -- split `M n z` into subsets `K n z p` of small diameters by intersecting with the ball -- `closedBall (d p) (u n / 3)`. let K : ℕ → T → ℕ → Set E := fun n z p => closure (M n z) ∩ closedBall (d p) (u n / 3) -- on the sets `K n z p`, the map `f` is well approximated by `f' z` by design. have K_approx : ∀ (n) (z : T) (p), ApproximatesLinearOn f (f' z) (s ∩ K n z p) (r (f' z)) := by intro n z p x hx y hy have yM : y ∈ M n z := closure_M_subset _ _ ⟨hy.1, hy.2.1⟩ refine yM.2 _ ⟨hx.1, ?_⟩ calc dist x y ≤ dist x (d p) + dist y (d p) := dist_triangle_right _ _ _ _ ≤ u n / 3 + u n / 3 := add_le_add hx.2.2 hy.2.2 _ < u n := by linarith [u_pos n] -- the sets `K n z p` are also closed, again by design. have K_closed : ∀ (n) (z : T) (p), IsClosed (K n z p) := fun n z p => isClosed_closure.inter isClosed_ball -- reindex the sets `K n z p`, to let them only depend on an integer parameter `q`. obtain ⟨F, hF⟩ : ∃ F : ℕ → ℕ × T × ℕ, Function.Surjective F := by haveI : Encodable T := T_count.toEncodable have : Nonempty T := by rcases hs with ⟨x, xs⟩ rcases s_subset x xs with ⟨n, z, _⟩ exact ⟨z⟩ inhabit ↥T exact ⟨_, Encodable.surjective_decode_iget (ℕ × T × ℕ)⟩ -- these sets `t q = K n z p` will do refine ⟨fun q => K (F q).1 (F q).2.1 (F q).2.2, fun q => f' (F q).2.1, fun n => K_closed _ _ _, fun x xs => ?_, fun q => K_approx _ _ _, fun _ q => ⟨(F q).2.1, (F q).2.1.1.2, rfl⟩⟩ -- the only fact that needs further checking is that they cover `s`. -- we already know that any point `x ∈ s` belongs to a set `M n z`. obtain ⟨n, z, hnz⟩ : ∃ (n : ℕ) (z : T), x ∈ M n z := s_subset x xs -- by density, it also belongs to a ball `closedBall (d p) (u n / 3)`. obtain ⟨p, hp⟩ : ∃ p : ℕ, x ∈ closedBall (d p) (u n / 3) := by have : Set.Nonempty (ball x (u n / 3)) := by simp only [nonempty_ball]; linarith [u_pos n] obtain ⟨p, hp⟩ : ∃ p : ℕ, d p ∈ ball x (u n / 3) := hd.exists_mem_open isOpen_ball this exact ⟨p, (mem_ball'.1 hp).le⟩ -- choose `q` for which `t q = K n z p`. obtain ⟨q, hq⟩ : ∃ q, F q = (n, z, p) := hF _ -- then `x` belongs to `t q`. apply mem_iUnion.2 ⟨q, _⟩ simp (config := { zeta := false }) only [K, hq, mem_inter_iff, hp, and_true] exact subset_closure hnz #align exists_closed_cover_approximates_linear_on_of_has_fderiv_within_at exists_closed_cover_approximatesLinearOn_of_hasFDerivWithinAt variable [MeasurableSpace E] [BorelSpace E] (μ : Measure E) [IsAddHaarMeasure μ] theorem exists_partition_approximatesLinearOn_of_hasFDerivWithinAt [SecondCountableTopology F] (f : E → F) (s : Set E) (f' : E → E →L[ℝ] F) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (r : (E →L[ℝ] F) → ℝ≥0) (rpos : ∀ A, r A ≠ 0) : ∃ (t : ℕ → Set E) (A : ℕ → E →L[ℝ] F), Pairwise (Disjoint on t) ∧ (∀ n, MeasurableSet (t n)) ∧ (s ⊆ ⋃ n, t n) ∧ (∀ n, ApproximatesLinearOn f (A n) (s ∩ t n) (r (A n))) ∧ (s.Nonempty → ∀ n, ∃ y ∈ s, A n = f' y) := by rcases exists_closed_cover_approximatesLinearOn_of_hasFDerivWithinAt f s f' hf' r rpos with ⟨t, A, t_closed, st, t_approx, ht⟩ refine ⟨disjointed t, A, disjoint_disjointed _, MeasurableSet.disjointed fun n => (t_closed n).measurableSet, ?_, ?_, ht⟩ · rw [iUnion_disjointed]; exact st · intro n; exact (t_approx n).mono_set (inter_subset_inter_right _ (disjointed_subset _ _)) #align exists_partition_approximates_linear_on_of_has_fderiv_within_at exists_partition_approximatesLinearOn_of_hasFDerivWithinAt namespace MeasureTheory theorem addHaar_image_le_mul_of_det_lt (A : E →L[ℝ] E) {m : ℝ≥0} (hm : ENNReal.ofReal \|A.det\| < m) : ∀ᶠ δ in 𝓝[>] (0 : ℝ≥0), ∀ (s : Set E) (f : E → E), ApproximatesLinearOn f A s δ → μ (f '' s) ≤ m * μ s := by apply nhdsWithin_le_nhds let d := ENNReal.ofReal \|A.det\| -- construct a small neighborhood of `A '' (closedBall 0 1)` with measure comparable to -- the determinant of `A`. obtain ⟨ε, hε, εpos⟩ : ∃ ε : ℝ, μ (closedBall 0 ε + A '' closedBall 0 1) < m * μ (closedBall 0 1) ∧ 0 < ε := by have HC : IsCompact (A '' closedBall 0 1) := (ProperSpace.isCompact_closedBall _ _).image A.continuous have L0 : Tendsto (fun ε => μ (cthickening ε (A '' closedBall 0 1))) (𝓝[>] 0) (𝓝 (μ (A '' closedBall 0 1))) := by apply Tendsto.mono_left _ nhdsWithin_le_nhds exact tendsto_measure_cthickening_of_isCompact HC have L1 : Tendsto (fun ε => μ (closedBall 0 ε + A '' closedBall 0 1)) (𝓝[>] 0) (𝓝 (μ (A '' closedBall 0 1))) := by apply L0.congr' _ filter_upwards [self_mem_nhdsWithin] with r hr rw [← HC.add_closedBall_zero (le_of_lt hr), add_comm] have L2 : Tendsto (fun ε => μ (closedBall 0 ε + A '' closedBall 0 1)) (𝓝[>] 0) (𝓝 (d * μ (closedBall 0 1))) := by convert L1 exact (addHaar_image_continuousLinearMap _ _ _).symm have I : d * μ (closedBall 0 1) < m * μ (closedBall 0 1) := (ENNReal.mul_lt_mul_right (measure_closedBall_pos μ _ zero_lt_one).ne' measure_closedBall_lt_top.ne).2 hm have H : ∀ᶠ b : ℝ in 𝓝[>] 0, μ (closedBall 0 b + A '' closedBall 0 1) < m * μ (closedBall 0 1) := (tendsto_order.1 L2).2 _ I exact (H.and self_mem_nhdsWithin).exists have : Iio (⟨ε, εpos.le⟩ : ℝ≥0) ∈ 𝓝 (0 : ℝ≥0) := by apply Iio_mem_nhds; exact εpos filter_upwards [this] -- fix a function `f` which is close enough to `A`. intro δ hδ s f hf simp only [mem_Iio, ← NNReal.coe_lt_coe, NNReal.coe_mk] at hδ -- This function expands the volume of any ball by at most `m` have I : ∀ x r, x ∈ s → 0 ≤ r → μ (f '' (s ∩ closedBall x r)) ≤ m * μ (closedBall x r) := by intro x r xs r0 have K : f '' (s ∩ closedBall x r) ⊆ A '' closedBall 0 r + closedBall (f x) (ε * r) := by rintro y ⟨z, ⟨zs, zr⟩, rfl⟩ rw [mem_closedBall_iff_norm] at zr apply Set.mem_add.2 ⟨A (z - x), _, f z - f x - A (z - x) + f x, _, _⟩ · apply mem_image_of_mem simpa only [dist_eq_norm, mem_closedBall, mem_closedBall_zero_iff, sub_zero] using zr · rw [mem_closedBall_iff_norm, add_sub_cancel_right] calc ‖f z - f x - A (z - x)‖ ≤ δ * ‖z - x‖ := hf _ zs _ xs _ ≤ ε * r := by gcongr · simp only [map_sub, Pi.sub_apply] abel have : A '' closedBall 0 r + closedBall (f x) (ε * r) = {f x} + r • (A '' closedBall 0 1 + closedBall 0 ε) := by rw [smul_add, ← add_assoc, add_comm {f x}, add_assoc, smul_closedBall _ _ εpos.le, smul_zero, singleton_add_closedBall_zero, ← image_smul_set ℝ E E A, smul_closedBall _ _ zero_le_one, smul_zero, Real.norm_eq_abs, abs_of_nonneg r0, mul_one, mul_comm] rw [this] at K calc μ (f '' (s ∩ closedBall x r)) ≤ μ ({f x} + r • (A '' closedBall 0 1 + closedBall 0 ε)) := measure_mono K _ = ENNReal.ofReal (r ^ finrank ℝ E) * μ (A '' closedBall 0 1 + closedBall 0 ε) := by simp only [abs_of_nonneg r0, addHaar_smul, image_add_left, abs_pow, singleton_add, measure_preimage_add] _ ≤ ENNReal.ofReal (r ^ finrank ℝ E) * (m * μ (closedBall 0 1)) := by rw [add_comm]; gcongr _ = m * μ (closedBall x r) := by simp only [addHaar_closedBall' μ _ r0]; ring -- covering `s` by closed balls with total measure very close to `μ s`, one deduces that the -- measure of `f '' s` is at most `m * (μ s + a)` for any positive `a`. have J : ∀ᶠ a in 𝓝[>] (0 : ℝ≥0∞), μ (f '' s) ≤ m * (μ s + a) := by filter_upwards [self_mem_nhdsWithin] with a ha rw [mem_Ioi] at ha obtain ⟨t, r, t_count, ts, rpos, st, μt⟩ : ∃ (t : Set E) (r : E → ℝ), t.Countable ∧ t ⊆ s ∧ (∀ x : E, x ∈ t → 0 < r x) ∧ (s ⊆ ⋃ x ∈ t, closedBall x (r x)) ∧ (∑' x : ↥t, μ (closedBall (↑x) (r ↑x))) ≤ μ s + a := Besicovitch.exists_closedBall_covering_tsum_measure_le μ ha.ne' (fun _ => Ioi 0) s fun x _ δ δpos => ⟨δ / 2, by simp [half_pos δpos, δpos]⟩ haveI : Encodable t := t_count.toEncodable calc μ (f '' s) ≤ μ (⋃ x : t, f '' (s ∩ closedBall x (r x))) := by rw [biUnion_eq_iUnion] at st apply measure_mono rw [← image_iUnion, ← inter_iUnion] exact image_subset _ (subset_inter (Subset.refl _) st) _ ≤ ∑' x : t, μ (f '' (s ∩ closedBall x (r x))) := measure_iUnion_le _ _ ≤ ∑' x : t, m * μ (closedBall x (r x)) := (ENNReal.tsum_le_tsum fun x => I x (r x) (ts x.2) (rpos x x.2).le) _ ≤ m * (μ s + a) := by rw [ENNReal.tsum_mul_left]; gcongr -- taking the limit in `a`, one obtains the conclusion have L : Tendsto (fun a => (m : ℝ≥0∞) * (μ s + a)) (𝓝[>] 0) (𝓝 (m * (μ s + 0))) := by apply Tendsto.mono_left _ nhdsWithin_le_nhds apply ENNReal.Tendsto.const_mul (tendsto_const_nhds.add tendsto_id) simp only [ENNReal.coe_ne_top, Ne, or_true_iff, not_false_iff] rw [add_zero] at L exact ge_of_tendsto L J #align measure_theory.add_haar_image_le_mul_of_det_lt MeasureTheory.addHaar_image_le_mul_of_det_lt theorem mul_le_addHaar_image_of_lt_det (A : E →L[ℝ] E) {m : ℝ≥0} (hm : (m : ℝ≥0∞) < ENNReal.ofReal \|A.det\|) : ∀ᶠ δ in 𝓝[>] (0 : ℝ≥0), ∀ (s : Set E) (f : E → E), ApproximatesLinearOn f A s δ → (m : ℝ≥0∞) * μ s ≤ μ (f '' s) := by apply nhdsWithin_le_nhds -- The assumption `hm` implies that `A` is invertible. If `f` is close enough to `A`, it is also -- invertible. One can then pass to the inverses, and deduce the estimate from -- `addHaar_image_le_mul_of_det_lt` applied to `f⁻¹` and `A⁻¹`. -- exclude first the trivial case where `m = 0`. rcases eq_or_lt_of_le (zero_le m) with (rfl \| mpos) · filter_upwards simp only [forall_const, zero_mul, imp_true_iff, zero_le, ENNReal.coe_zero] have hA : A.det ≠ 0 := by intro h; simp only [h, ENNReal.not_lt_zero, ENNReal.ofReal_zero, abs_zero] at hm -- let `B` be the continuous linear equiv version of `A`. let B := A.toContinuousLinearEquivOfDetNeZero hA -- the determinant of `B.symm` is bounded by `m⁻¹` have I : ENNReal.ofReal \|(B.symm : E →L[ℝ] E).det\| < (m⁻¹ : ℝ≥0) := by simp only [ENNReal.ofReal, abs_inv, Real.toNNReal_inv, ContinuousLinearEquiv.det_coe_symm, ContinuousLinearMap.coe_toContinuousLinearEquivOfDetNeZero, ENNReal.coe_lt_coe] at hm ⊢ exact NNReal.inv_lt_inv mpos.ne' hm -- therefore, we may apply `addHaar_image_le_mul_of_det_lt` to `B.symm` and `m⁻¹`. obtain ⟨δ₀, δ₀pos, hδ₀⟩ : ∃ δ : ℝ≥0, 0 < δ ∧ ∀ (t : Set E) (g : E → E), ApproximatesLinearOn g (B.symm : E →L[ℝ] E) t δ → μ (g '' t) ≤ ↑m⁻¹ * μ t := by have : ∀ᶠ δ : ℝ≥0 in 𝓝[>] 0, ∀ (t : Set E) (g : E → E), ApproximatesLinearOn g (B.symm : E →L[ℝ] E) t δ → μ (g '' t) ≤ ↑m⁻¹ * μ t := addHaar_image_le_mul_of_det_lt μ B.symm I rcases (this.and self_mem_nhdsWithin).exists with ⟨δ₀, h, h'⟩ exact ⟨δ₀, h', h⟩ -- record smallness conditions for `δ` that will be needed to apply `hδ₀` below. have L1 : ∀ᶠ δ in 𝓝 (0 : ℝ≥0), Subsingleton E ∨ δ < ‖(B.symm : E →L[ℝ] E)‖₊⁻¹ := by by_cases h : Subsingleton E · simp only [h, true_or_iff, eventually_const] simp only [h, false_or_iff] apply Iio_mem_nhds simpa only [h, false_or_iff, inv_pos] using B.subsingleton_or_nnnorm_symm_pos have L2 : ∀ᶠ δ in 𝓝 (0 : ℝ≥0), ‖(B.symm : E →L[ℝ] E)‖₊ * (‖(B.symm : E →L[ℝ] E)‖₊⁻¹ - δ)⁻¹ * δ < δ₀ := by have : Tendsto (fun δ => ‖(B.symm : E →L[ℝ] E)‖₊ * (‖(B.symm : E →L[ℝ] E)‖₊⁻¹ - δ)⁻¹ * δ) (𝓝 0) (𝓝 (‖(B.symm : E →L[ℝ] E)‖₊ * (‖(B.symm : E →L[ℝ] E)‖₊⁻¹ - 0)⁻¹ * 0)) := by rcases eq_or_ne ‖(B.symm : E →L[ℝ] E)‖₊ 0 with (H \| H) · simpa only [H, zero_mul] using tendsto_const_nhds refine Tendsto.mul (tendsto_const_nhds.mul ?_) tendsto_id refine (Tendsto.sub tendsto_const_nhds tendsto_id).inv₀ ?_ simpa only [tsub_zero, inv_eq_zero, Ne] using H simp only [mul_zero] at this exact (tendsto_order.1 this).2 δ₀ δ₀pos -- let `δ` be small enough, and `f` approximated by `B` up to `δ`. filter_upwards [L1, L2] intro δ h1δ h2δ s f hf have hf' : ApproximatesLinearOn f (B : E →L[ℝ] E) s δ := by convert hf let F := hf'.toPartialEquiv h1δ -- the condition to be checked can be reformulated in terms of the inverse maps suffices H : μ (F.symm '' F.target) ≤ (m⁻¹ : ℝ≥0) * μ F.target by change (m : ℝ≥0∞) * μ F.source ≤ μ F.target rwa [← F.symm_image_target_eq_source, mul_comm, ← ENNReal.le_div_iff_mul_le, div_eq_mul_inv, mul_comm, ← ENNReal.coe_inv mpos.ne'] · apply Or.inl simpa only [ENNReal.coe_eq_zero, Ne] using mpos.ne' · simp only [ENNReal.coe_ne_top, true_or_iff, Ne, not_false_iff] -- as `f⁻¹` is well approximated by `B⁻¹`, the conclusion follows from `hδ₀` -- and our choice of `δ`. exact hδ₀ _ _ ((hf'.to_inv h1δ).mono_num h2δ.le) #align measure_theory.mul_le_add_haar_image_of_lt_det MeasureTheory.mul_le_addHaar_image_of_lt_det theorem _root_.ApproximatesLinearOn.norm_fderiv_sub_le {A : E →L[ℝ] E} {δ : ℝ≥0} (hf : ApproximatesLinearOn f A s δ) (hs : MeasurableSet s) (f' : E → E →L[ℝ] E) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) : ∀ᵐ x ∂μ.restrict s, ‖f' x - A‖₊ ≤ δ := by filter_upwards [Besicovitch.ae_tendsto_measure_inter_div μ s, ae_restrict_mem hs] -- start from a Lebesgue density point `x`, belonging to `s`. intro x hx xs -- consider an arbitrary vector `z`. apply ContinuousLinearMap.opNorm_le_bound _ δ.2 fun z => ?_ -- to show that `‖(f' x - A) z‖ ≤ δ ‖z‖`, it suffices to do it up to some error that vanishes -- asymptotically in terms of `ε > 0`. suffices H : ∀ ε, 0 < ε → ‖(f' x - A) z‖ ≤ (δ + ε) * (‖z‖ + ε) + ‖f' x - A‖ * ε by have : Tendsto (fun ε : ℝ => ((δ : ℝ) + ε) * (‖z‖ + ε) + ‖f' x - A‖ * ε) (𝓝[>] 0) (𝓝 ((δ + 0) * (‖z‖ + 0) + ‖f' x - A‖ * 0)) := Tendsto.mono_left (Continuous.tendsto (by continuity) 0) nhdsWithin_le_nhds simp only [add_zero, mul_zero] at this apply le_of_tendsto_of_tendsto tendsto_const_nhds this filter_upwards [self_mem_nhdsWithin] exact H -- fix a positive `ε`. intro ε εpos -- for small enough `r`, the rescaled ball `r • closedBall z ε` intersects `s`, as `x` is a -- density point have B₁ : ∀ᶠ r in 𝓝[>] (0 : ℝ), (s ∩ ({x} + r • closedBall z ε)).Nonempty := eventually_nonempty_inter_smul_of_density_one μ s x hx _ measurableSet_closedBall (measure_closedBall_pos μ z εpos).ne' obtain ⟨ρ, ρpos, hρ⟩ : ∃ ρ > 0, ball x ρ ∩ s ⊆ {y : E \| ‖f y - f x - (f' x) (y - x)‖ ≤ ε * ‖y - x‖} := mem_nhdsWithin_iff.1 ((hf' x xs).isLittleO.def εpos) -- for small enough `r`, the rescaled ball `r • closedBall z ε` is included in the set where -- `f y - f x` is well approximated by `f' x (y - x)`. have B₂ : ∀ᶠ r in 𝓝[>] (0 : ℝ), {x} + r • closedBall z ε ⊆ ball x ρ := by apply nhdsWithin_le_nhds exact eventually_singleton_add_smul_subset isBounded_closedBall (ball_mem_nhds x ρpos) -- fix a small positive `r` satisfying the above properties, as well as a corresponding `y`. obtain ⟨r, ⟨y, ⟨ys, hy⟩⟩, rρ, rpos⟩ : ∃ r : ℝ, (s ∩ ({x} + r • closedBall z ε)).Nonempty ∧ {x} + r • closedBall z ε ⊆ ball x ρ ∧ 0 < r := (B₁.and (B₂.and self_mem_nhdsWithin)).exists -- write `y = x + r a` with `a ∈ closedBall z ε`. obtain ⟨a, az, ya⟩ : ∃ a, a ∈ closedBall z ε ∧ y = x + r • a := by simp only [mem_smul_set, image_add_left, mem_preimage, singleton_add] at hy rcases hy with ⟨a, az, ha⟩ exact ⟨a, az, by simp only [ha, add_neg_cancel_left]⟩ have norm_a : ‖a‖ ≤ ‖z‖ + ε := calc ‖a‖ = ‖z + (a - z)‖ := by simp only [add_sub_cancel] _ ≤ ‖z‖ + ‖a - z‖ := norm_add_le _ _ _ ≤ ‖z‖ + ε := add_le_add_left (mem_closedBall_iff_norm.1 az) _ -- use the approximation properties to control `(f' x - A) a`, and then `(f' x - A) z` as `z` is -- close to `a`. have I : r * ‖(f' x - A) a‖ ≤ r * (δ + ε) * (‖z‖ + ε) := calc r * ‖(f' x - A) a‖ = ‖(f' x - A) (r • a)‖ := by simp only [ContinuousLinearMap.map_smul, norm_smul, Real.norm_eq_abs, abs_of_nonneg rpos.le] _ = ‖f y - f x - A (y - x) - (f y - f x - (f' x) (y - x))‖ := by congr 1 simp only [ya, add_sub_cancel_left, sub_sub_sub_cancel_left, ContinuousLinearMap.coe_sub', eq_self_iff_true, sub_left_inj, Pi.sub_apply, ContinuousLinearMap.map_smul, smul_sub] _ ≤ ‖f y - f x - A (y - x)‖ + ‖f y - f x - (f' x) (y - x)‖ := norm_sub_le _ _ _ ≤ δ * ‖y - x‖ + ε * ‖y - x‖ := (add_le_add (hf _ ys _ xs) (hρ ⟨rρ hy, ys⟩)) _ = r * (δ + ε) * ‖a‖ := by simp only [ya, add_sub_cancel_left, norm_smul, Real.norm_eq_abs, abs_of_nonneg rpos.le] ring _ ≤ r * (δ + ε) * (‖z‖ + ε) := by gcongr calc ‖(f' x - A) z‖ = ‖(f' x - A) a + (f' x - A) (z - a)‖ := by congr 1 simp only [ContinuousLinearMap.coe_sub', map_sub, Pi.sub_apply] abel _ ≤ ‖(f' x - A) a‖ + ‖(f' x - A) (z - a)‖ := norm_add_le _ _ _ ≤ (δ + ε) * (‖z‖ + ε) + ‖f' x - A‖ * ‖z - a‖ := by apply add_le_add · rw [mul_assoc] at I; exact (mul_le_mul_left rpos).1 I · apply ContinuousLinearMap.le_opNorm _ ≤ (δ + ε) * (‖z‖ + ε) + ‖f' x - A‖ * ε := by rw [mem_closedBall_iff_norm'] at az gcongr #align approximates_linear_on.norm_fderiv_sub_le ApproximatesLinearOn.norm_fderiv_sub_le theorem addHaar_image_eq_zero_of_differentiableOn_of_addHaar_eq_zero (hf : DifferentiableOn ℝ f s) (hs : μ s = 0) : μ (f '' s) = 0 := by refine le_antisymm ?_ (zero_le _) have : ∀ A : E →L[ℝ] E, ∃ δ : ℝ≥0, 0 < δ ∧ ∀ (t : Set E), ApproximatesLinearOn f A t δ → μ (f '' t) ≤ (Real.toNNReal \|A.det\| + 1 : ℝ≥0) * μ t := by intro A let m : ℝ≥0 := Real.toNNReal \|A.det\| + 1 have I : ENNReal.ofReal \|A.det\| < m := by simp only [m, ENNReal.ofReal, lt_add_iff_pos_right, zero_lt_one, ENNReal.coe_lt_coe] rcases ((addHaar_image_le_mul_of_det_lt μ A I).and self_mem_nhdsWithin).exists with ⟨δ, h, h'⟩ exact ⟨δ, h', fun t ht => h t f ht⟩ choose δ hδ using this obtain ⟨t, A, _, _, t_cover, ht, -⟩ : ∃ (t : ℕ → Set E) (A : ℕ → E →L[ℝ] E), Pairwise (Disjoint on t) ∧ (∀ n : ℕ, MeasurableSet (t n)) ∧ (s ⊆ ⋃ n : ℕ, t n) ∧ (∀ n : ℕ, ApproximatesLinearOn f (A n) (s ∩ t n) (δ (A n))) ∧ (s.Nonempty → ∀ n, ∃ y ∈ s, A n = fderivWithin ℝ f s y) := exists_partition_approximatesLinearOn_of_hasFDerivWithinAt f s (fderivWithin ℝ f s) (fun x xs => (hf x xs).hasFDerivWithinAt) δ fun A => (hδ A).1.ne' calc μ (f '' s) ≤ μ (⋃ n, f '' (s ∩ t n)) := by apply measure_mono rw [← image_iUnion, ← inter_iUnion] exact image_subset f (subset_inter Subset.rfl t_cover) _ ≤ ∑' n, μ (f '' (s ∩ t n)) := measure_iUnion_le _ _ ≤ ∑' n, (Real.toNNReal \|(A n).det\| + 1 : ℝ≥0) * μ (s ∩ t n) := by apply ENNReal.tsum_le_tsum fun n => ?_ apply (hδ (A n)).2 exact ht n _ ≤ ∑' n, ((Real.toNNReal \|(A n).det\| + 1 : ℝ≥0) : ℝ≥0∞) * 0 := by refine ENNReal.tsum_le_tsum fun n => mul_le_mul_left' ?_ _ exact le_trans (measure_mono inter_subset_left) (le_of_eq hs) _ = 0 := by simp only [tsum_zero, mul_zero] #align measure_theory.add_haar_image_eq_zero_of_differentiable_on_of_add_haar_eq_zero MeasureTheory.addHaar_image_eq_zero_of_differentiableOn_of_addHaar_eq_zero theorem addHaar_image_eq_zero_of_det_fderivWithin_eq_zero_aux (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (R : ℝ) (hs : s ⊆ closedBall 0 R) (ε : ℝ≥0) (εpos : 0 < ε) (h'f' : ∀ x ∈ s, (f' x).det = 0) : μ (f '' s) ≤ ε * μ (closedBall 0 R) := by rcases eq_empty_or_nonempty s with (rfl \| h's); · simp only [measure_empty, zero_le, image_empty] have : ∀ A : E →L[ℝ] E, ∃ δ : ℝ≥0, 0 < δ ∧ ∀ (t : Set E), ApproximatesLinearOn f A t δ → μ (f '' t) ≤ (Real.toNNReal \|A.det\| + ε : ℝ≥0) * μ t := by intro A let m : ℝ≥0 := Real.toNNReal \|A.det\| + ε have I : ENNReal.ofReal \|A.det\| < m := by simp only [m, ENNReal.ofReal, lt_add_iff_pos_right, εpos, ENNReal.coe_lt_coe] rcases ((addHaar_image_le_mul_of_det_lt μ A I).and self_mem_nhdsWithin).exists with ⟨δ, h, h'⟩ exact ⟨δ, h', fun t ht => h t f ht⟩ choose δ hδ using this obtain ⟨t, A, t_disj, t_meas, t_cover, ht, Af'⟩ : ∃ (t : ℕ → Set E) (A : ℕ → E →L[ℝ] E), Pairwise (Disjoint on t) ∧ (∀ n : ℕ, MeasurableSet (t n)) ∧ (s ⊆ ⋃ n : ℕ, t n) ∧ (∀ n : ℕ, ApproximatesLinearOn f (A n) (s ∩ t n) (δ (A n))) ∧ (s.Nonempty → ∀ n, ∃ y ∈ s, A n = f' y) := exists_partition_approximatesLinearOn_of_hasFDerivWithinAt f s f' hf' δ fun A => (hδ A).1.ne' calc μ (f '' s) ≤ μ (⋃ n, f '' (s ∩ t n)) := by rw [← image_iUnion, ← inter_iUnion] gcongr exact subset_inter Subset.rfl t_cover _ ≤ ∑' n, μ (f '' (s ∩ t n)) := measure_iUnion_le _ _ ≤ ∑' n, (Real.toNNReal \|(A n).det\| + ε : ℝ≥0) * μ (s ∩ t n) := by gcongr exact (hδ (A _)).2 _ (ht _) _ = ∑' n, ε * μ (s ∩ t n) := by congr with n rcases Af' h's n with ⟨y, ys, hy⟩ simp only [hy, h'f' y ys, Real.toNNReal_zero, abs_zero, zero_add] _ ≤ ε * ∑' n, μ (closedBall 0 R ∩ t n) := by rw [ENNReal.tsum_mul_left] gcongr _ = ε * μ (⋃ n, closedBall 0 R ∩ t n) := by rw [measure_iUnion] · exact pairwise_disjoint_mono t_disj fun n => inter_subset_right · intro n exact measurableSet_closedBall.inter (t_meas n) _ ≤ ε * μ (closedBall 0 R) := by rw [← inter_iUnion] exact mul_le_mul_left' (measure_mono inter_subset_left) _ #align measure_theory.add_haar_image_eq_zero_of_det_fderiv_within_eq_zero_aux MeasureTheory.addHaar_image_eq_zero_of_det_fderivWithin_eq_zero_aux theorem addHaar_image_eq_zero_of_det_fderivWithin_eq_zero (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (h'f' : ∀ x ∈ s, (f' x).det = 0) : μ (f '' s) = 0 := by suffices H : ∀ R, μ (f '' (s ∩ closedBall 0 R)) = 0 by apply le_antisymm _ (zero_le _) rw [← iUnion_inter_closedBall_nat s 0] calc μ (f '' ⋃ n : ℕ, s ∩ closedBall 0 n) ≤ ∑' n : ℕ, μ (f '' (s ∩ closedBall 0 n)) := by rw [image_iUnion]; exact measure_iUnion_le _ _ ≤ 0 := by simp only [H, tsum_zero, nonpos_iff_eq_zero] intro R have A : ∀ (ε : ℝ≥0), 0 < ε → μ (f '' (s ∩ closedBall 0 R)) ≤ ε * μ (closedBall 0 R) := fun ε εpos => addHaar_image_eq_zero_of_det_fderivWithin_eq_zero_aux μ (fun x hx => (hf' x hx.1).mono inter_subset_left) R inter_subset_right ε εpos fun x hx => h'f' x hx.1 have B : Tendsto (fun ε : ℝ≥0 => (ε : ℝ≥0∞) * μ (closedBall 0 R)) (𝓝[>] 0) (𝓝 0) := by have : Tendsto (fun ε : ℝ≥0 => (ε : ℝ≥0∞) * μ (closedBall 0 R)) (𝓝 0) (𝓝 (((0 : ℝ≥0) : ℝ≥0∞) * μ (closedBall 0 R))) := ENNReal.Tendsto.mul_const (ENNReal.tendsto_coe.2 tendsto_id) (Or.inr measure_closedBall_lt_top.ne) simp only [zero_mul, ENNReal.coe_zero] at this exact Tendsto.mono_left this nhdsWithin_le_nhds apply le_antisymm _ (zero_le _) apply ge_of_tendsto B filter_upwards [self_mem_nhdsWithin] exact A #align measure_theory.add_haar_image_eq_zero_of_det_fderiv_within_eq_zero MeasureTheory.addHaar_image_eq_zero_of_det_fderivWithin_eq_zero theorem aemeasurable_fderivWithin (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) : AEMeasurable f' (μ.restrict s) := by -- fix a precision `ε` refine aemeasurable_of_unif_approx fun ε εpos => ?_ let δ : ℝ≥0 := ⟨ε, le_of_lt εpos⟩ have δpos : 0 < δ := εpos -- partition `s` into sets `s ∩ t n` on which `f` is approximated by linear maps `A n`. obtain ⟨t, A, t_disj, t_meas, t_cover, ht, _⟩ : ∃ (t : ℕ → Set E) (A : ℕ → E →L[ℝ] E), Pairwise (Disjoint on t) ∧ (∀ n : ℕ, MeasurableSet (t n)) ∧ (s ⊆ ⋃ n : ℕ, t n) ∧ (∀ n : ℕ, ApproximatesLinearOn f (A n) (s ∩ t n) δ) ∧ (s.Nonempty → ∀ n, ∃ y ∈ s, A n = f' y) := exists_partition_approximatesLinearOn_of_hasFDerivWithinAt f s f' hf' (fun _ => δ) fun _ => δpos.ne' -- define a measurable function `g` which coincides with `A n` on `t n`. obtain ⟨g, g_meas, hg⟩ : ∃ g : E → E →L[ℝ] E, Measurable g ∧ ∀ (n : ℕ) (x : E), x ∈ t n → g x = A n := exists_measurable_piecewise t t_meas (fun n _ => A n) (fun n => measurable_const) <\| t_disj.mono fun i j h => by simp only [h.inter_eq, eqOn_empty] refine ⟨g, g_meas.aemeasurable, ?_⟩ -- reduce to checking that `f'` and `g` are close on almost all of `s ∩ t n`, for all `n`. suffices H : ∀ᵐ x : E ∂sum fun n ↦ μ.restrict (s ∩ t n), dist (g x) (f' x) ≤ ε by have : μ.restrict s ≤ sum fun n => μ.restrict (s ∩ t n) := by have : s = ⋃ n, s ∩ t n := by rw [← inter_iUnion] exact Subset.antisymm (subset_inter Subset.rfl t_cover) inter_subset_left conv_lhs => rw [this] exact restrict_iUnion_le exact ae_mono this H -- fix such an `n`. refine ae_sum_iff.2 fun n => ?_ -- on almost all `s ∩ t n`, `f' x` is close to `A n` thanks to -- `ApproximatesLinearOn.norm_fderiv_sub_le`. have E₁ : ∀ᵐ x : E ∂μ.restrict (s ∩ t n), ‖f' x - A n‖₊ ≤ δ := (ht n).norm_fderiv_sub_le μ (hs.inter (t_meas n)) f' fun x hx => (hf' x hx.1).mono inter_subset_left -- moreover, `g x` is equal to `A n` there. have E₂ : ∀ᵐ x : E ∂μ.restrict (s ∩ t n), g x = A n := by suffices H : ∀ᵐ x : E ∂μ.restrict (t n), g x = A n from ae_mono (restrict_mono inter_subset_right le_rfl) H filter_upwards [ae_restrict_mem (t_meas n)] exact hg n -- putting these two properties together gives the conclusion. filter_upwards [E₁, E₂] with x hx1 hx2 rw [← nndist_eq_nnnorm] at hx1 rw [hx2, dist_comm] exact hx1 #align measure_theory.ae_measurable_fderiv_within MeasureTheory.aemeasurable_fderivWithin theorem aemeasurable_ofReal_abs_det_fderivWithin (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) : AEMeasurable (fun x => ENNReal.ofReal \|(f' x).det\|) (μ.restrict s) := by apply ENNReal.measurable_ofReal.comp_aemeasurable refine continuous_abs.measurable.comp_aemeasurable ?_ refine ContinuousLinearMap.continuous_det.measurable.comp_aemeasurable ?_ exact aemeasurable_fderivWithin μ hs hf' #align measure_theory.ae_measurable_of_real_abs_det_fderiv_within MeasureTheory.aemeasurable_ofReal_abs_det_fderivWithin theorem aemeasurable_toNNReal_abs_det_fderivWithin (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) : AEMeasurable (fun x => \|(f' x).det\|.toNNReal) (μ.restrict s) := by apply measurable_real_toNNReal.comp_aemeasurable refine continuous_abs.measurable.comp_aemeasurable ?_ refine ContinuousLinearMap.continuous_det.measurable.comp_aemeasurable ?_ exact aemeasurable_fderivWithin μ hs hf' #align measure_theory.ae_measurable_to_nnreal_abs_det_fderiv_within MeasureTheory.aemeasurable_toNNReal_abs_det_fderivWithin theorem measurable_image_of_fderivWithin (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) : MeasurableSet (f '' s) := haveI : DifferentiableOn ℝ f s := fun x hx => (hf' x hx).differentiableWithinAt hs.image_of_continuousOn_injOn (DifferentiableOn.continuousOn this) hf #align measure_theory.measurable_image_of_fderiv_within MeasureTheory.measurable_image_of_fderivWithin theorem measurableEmbedding_of_fderivWithin (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) : MeasurableEmbedding (s.restrict f) := haveI : DifferentiableOn ℝ f s := fun x hx => (hf' x hx).differentiableWithinAt this.continuousOn.measurableEmbedding hs hf #align measure_theory.measurable_embedding_of_fderiv_within MeasureTheory.measurableEmbedding_of_fderivWithin theorem addHaar_image_le_lintegral_abs_det_fderiv_aux1 (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) {ε : ℝ≥0} (εpos : 0 < ε) : μ (f '' s) ≤ (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) + 2 * ε * μ s := by have : ∀ A : E →L[ℝ] E, ∃ δ : ℝ≥0, 0 < δ ∧ (∀ B : E →L[ℝ] E, ‖B - A‖ ≤ δ → \|B.det - A.det\| ≤ ε) ∧ ∀ (t : Set E) (g : E → E), ApproximatesLinearOn g A t δ → μ (g '' t) ≤ (ENNReal.ofReal \|A.det\| + ε) * μ t := by intro A let m : ℝ≥0 := Real.toNNReal \|A.det\| + ε have I : ENNReal.ofReal \|A.det\| < m := by simp only [m, ENNReal.ofReal, lt_add_iff_pos_right, εpos, ENNReal.coe_lt_coe] rcases ((addHaar_image_le_mul_of_det_lt μ A I).and self_mem_nhdsWithin).exists with ⟨δ, h, δpos⟩ obtain ⟨δ', δ'pos, hδ'⟩ : ∃ (δ' : ℝ), 0 < δ' ∧ ∀ B, dist B A < δ' → dist B.det A.det < ↑ε := continuousAt_iff.1 ContinuousLinearMap.continuous_det.continuousAt ε εpos let δ'' : ℝ≥0 := ⟨δ' / 2, (half_pos δ'pos).le⟩ refine ⟨min δ δ'', lt_min δpos (half_pos δ'pos), ?_, ?_⟩ · intro B hB rw [← Real.dist_eq] apply (hδ' B _).le rw [dist_eq_norm] calc ‖B - A‖ ≤ (min δ δ'' : ℝ≥0) := hB _ ≤ δ'' := by simp only [le_refl, NNReal.coe_min, min_le_iff, or_true_iff] _ < δ' := half_lt_self δ'pos · intro t g htg exact h t g (htg.mono_num (min_le_left _ _)) choose δ hδ using this obtain ⟨t, A, t_disj, t_meas, t_cover, ht, -⟩ : ∃ (t : ℕ → Set E) (A : ℕ → E →L[ℝ] E), Pairwise (Disjoint on t) ∧ (∀ n : ℕ, MeasurableSet (t n)) ∧ (s ⊆ ⋃ n : ℕ, t n) ∧ (∀ n : ℕ, ApproximatesLinearOn f (A n) (s ∩ t n) (δ (A n))) ∧ (s.Nonempty → ∀ n, ∃ y ∈ s, A n = f' y) := exists_partition_approximatesLinearOn_of_hasFDerivWithinAt f s f' hf' δ fun A => (hδ A).1.ne' calc μ (f '' s) ≤ μ (⋃ n, f '' (s ∩ t n)) := by apply measure_mono rw [← image_iUnion, ← inter_iUnion] exact image_subset f (subset_inter Subset.rfl t_cover) _ ≤ ∑' n, μ (f '' (s ∩ t n)) := measure_iUnion_le _ _ ≤ ∑' n, (ENNReal.ofReal \|(A n).det\| + ε) * μ (s ∩ t n) := by apply ENNReal.tsum_le_tsum fun n => ?_ apply (hδ (A n)).2.2 exact ht n _ = ∑' n, ∫⁻ _ in s ∩ t n, ENNReal.ofReal \|(A n).det\| + ε ∂μ := by simp only [lintegral_const, MeasurableSet.univ, Measure.restrict_apply, univ_inter] _ ≤ ∑' n, ∫⁻ x in s ∩ t n, ENNReal.ofReal \|(f' x).det\| + 2 * ε ∂μ := by apply ENNReal.tsum_le_tsum fun n => ?_ apply lintegral_mono_ae filter_upwards [(ht n).norm_fderiv_sub_le μ (hs.inter (t_meas n)) f' fun x hx => (hf' x hx.1).mono inter_subset_left] intro x hx have I : \|(A n).det\| ≤ \|(f' x).det\| + ε := calc \|(A n).det\| = \|(f' x).det - ((f' x).det - (A n).det)\| := by congr 1; abel _ ≤ \|(f' x).det\| + \|(f' x).det - (A n).det\| := abs_sub _ _ _ ≤ \|(f' x).det\| + ε := add_le_add le_rfl ((hδ (A n)).2.1 _ hx) calc ENNReal.ofReal \|(A n).det\| + ε ≤ ENNReal.ofReal (\|(f' x).det\| + ε) + ε := by gcongr _ = ENNReal.ofReal \|(f' x).det\| + 2 * ε := by simp only [ENNReal.ofReal_add, abs_nonneg, two_mul, add_assoc, NNReal.zero_le_coe, ENNReal.ofReal_coe_nnreal] _ = ∫⁻ x in ⋃ n, s ∩ t n, ENNReal.ofReal \|(f' x).det\| + 2 * ε ∂μ := by have M : ∀ n : ℕ, MeasurableSet (s ∩ t n) := fun n => hs.inter (t_meas n) rw [lintegral_iUnion M] exact pairwise_disjoint_mono t_disj fun n => inter_subset_right _ = ∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| + 2 * ε ∂μ := by rw [← inter_iUnion, inter_eq_self_of_subset_left t_cover] _ = (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) + 2 * ε * μ s := by simp only [lintegral_add_right' _ aemeasurable_const, set_lintegral_const] #align measure_theory.add_haar_image_le_lintegral_abs_det_fderiv_aux1 MeasureTheory.addHaar_image_le_lintegral_abs_det_fderiv_aux1 theorem addHaar_image_le_lintegral_abs_det_fderiv_aux2 (hs : MeasurableSet s) (h's : μ s ≠ ∞) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) : μ (f '' s) ≤ ∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ := by -- We just need to let the error tend to `0` in the previous lemma. have : Tendsto (fun ε : ℝ≥0 => (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) + 2 * ε * μ s) (𝓝[>] 0) (𝓝 ((∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) + 2 * (0 : ℝ≥0) * μ s)) := by apply Tendsto.mono_left _ nhdsWithin_le_nhds refine tendsto_const_nhds.add ?_ refine ENNReal.Tendsto.mul_const ?_ (Or.inr h's) exact ENNReal.Tendsto.const_mul (ENNReal.tendsto_coe.2 tendsto_id) (Or.inr ENNReal.coe_ne_top) simp only [add_zero, zero_mul, mul_zero, ENNReal.coe_zero] at this apply ge_of_tendsto this filter_upwards [self_mem_nhdsWithin] intro ε εpos rw [mem_Ioi] at εpos exact addHaar_image_le_lintegral_abs_det_fderiv_aux1 μ hs hf' εpos #align measure_theory.add_haar_image_le_lintegral_abs_det_fderiv_aux2 MeasureTheory.addHaar_image_le_lintegral_abs_det_fderiv_aux2 theorem addHaar_image_le_lintegral_abs_det_fderiv (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) : μ (f '' s) ≤ ∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ := by let u n := disjointed (spanningSets μ) n have u_meas : ∀ n, MeasurableSet (u n) := by intro n apply MeasurableSet.disjointed fun i => ?_ exact measurable_spanningSets μ i have A : s = ⋃ n, s ∩ u n := by rw [← inter_iUnion, iUnion_disjointed, iUnion_spanningSets, inter_univ] calc μ (f '' s) ≤ ∑' n, μ (f '' (s ∩ u n)) := by conv_lhs => rw [A, image_iUnion] exact measure_iUnion_le _ _ ≤ ∑' n, ∫⁻ x in s ∩ u n, ENNReal.ofReal \|(f' x).det\| ∂μ := by apply ENNReal.tsum_le_tsum fun n => ?_ apply addHaar_image_le_lintegral_abs_det_fderiv_aux2 μ (hs.inter (u_meas n)) _ fun x hx => (hf' x hx.1).mono inter_subset_left have : μ (u n) < ∞ := lt_of_le_of_lt (measure_mono (disjointed_subset _ _)) (measure_spanningSets_lt_top μ n) exact ne_of_lt (lt_of_le_of_lt (measure_mono inter_subset_right) this) _ = ∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ := by conv_rhs => rw [A] rw [lintegral_iUnion] · intro n; exact hs.inter (u_meas n) · exact pairwise_disjoint_mono (disjoint_disjointed _) fun n => inter_subset_right #align measure_theory.add_haar_image_le_lintegral_abs_det_fderiv MeasureTheory.addHaar_image_le_lintegral_abs_det_fderiv theorem lintegral_abs_det_fderiv_le_addHaar_image_aux1 (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) {ε : ℝ≥0} (εpos : 0 < ε) : (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) ≤ μ (f '' s) + 2 * ε * μ s := by have : ∀ A : E →L[ℝ] E, ∃ δ : ℝ≥0, 0 < δ ∧ (∀ B : E →L[ℝ] E, ‖B - A‖ ≤ δ → \|B.det - A.det\| ≤ ε) ∧ ∀ (t : Set E) (g : E → E), ApproximatesLinearOn g A t δ → ENNReal.ofReal \|A.det\| * μ t ≤ μ (g '' t) + ε * μ t := by intro A obtain ⟨δ', δ'pos, hδ'⟩ : ∃ (δ' : ℝ), 0 < δ' ∧ ∀ B, dist B A < δ' → dist B.det A.det < ↑ε := continuousAt_iff.1 ContinuousLinearMap.continuous_det.continuousAt ε εpos let δ'' : ℝ≥0 := ⟨δ' / 2, (half_pos δ'pos).le⟩ have I'' : ∀ B : E →L[ℝ] E, ‖B - A‖ ≤ ↑δ'' → \|B.det - A.det\| ≤ ↑ε := by intro B hB rw [← Real.dist_eq] apply (hδ' B _).le rw [dist_eq_norm] exact hB.trans_lt (half_lt_self δ'pos) rcases eq_or_ne A.det 0 with (hA \| hA) · refine ⟨δ'', half_pos δ'pos, I'', ?_⟩ simp only [hA, forall_const, zero_mul, ENNReal.ofReal_zero, imp_true_iff, zero_le, abs_zero] let m : ℝ≥0 := Real.toNNReal \|A.det\| - ε have I : (m : ℝ≥0∞) < ENNReal.ofReal \|A.det\| := by simp only [m, ENNReal.ofReal, ENNReal.coe_sub] apply ENNReal.sub_lt_self ENNReal.coe_ne_top · simpa only [abs_nonpos_iff, Real.toNNReal_eq_zero, ENNReal.coe_eq_zero, Ne] using hA · simp only [εpos.ne', ENNReal.coe_eq_zero, Ne, not_false_iff] rcases ((mul_le_addHaar_image_of_lt_det μ A I).and self_mem_nhdsWithin).exists with ⟨δ, h, δpos⟩ refine ⟨min δ δ'', lt_min δpos (half_pos δ'pos), ?_, ?_⟩ · intro B hB apply I'' _ (hB.trans _) simp only [le_refl, NNReal.coe_min, min_le_iff, or_true_iff] · intro t g htg rcases eq_or_ne (μ t) ∞ with (ht \| ht) · simp only [ht, εpos.ne', ENNReal.mul_top, ENNReal.coe_eq_zero, le_top, Ne, not_false_iff, _root_.add_top] have := h t g (htg.mono_num (min_le_left _ _)) rwa [ENNReal.coe_sub, ENNReal.sub_mul, tsub_le_iff_right] at this simp only [ht, imp_true_iff, Ne, not_false_iff] choose δ hδ using this obtain ⟨t, A, t_disj, t_meas, t_cover, ht, -⟩ : ∃ (t : ℕ → Set E) (A : ℕ → E →L[ℝ] E), Pairwise (Disjoint on t) ∧ (∀ n : ℕ, MeasurableSet (t n)) ∧ (s ⊆ ⋃ n : ℕ, t n) ∧ (∀ n : ℕ, ApproximatesLinearOn f (A n) (s ∩ t n) (δ (A n))) ∧ (s.Nonempty → ∀ n, ∃ y ∈ s, A n = f' y) := exists_partition_approximatesLinearOn_of_hasFDerivWithinAt f s f' hf' δ fun A => (hδ A).1.ne' have s_eq : s = ⋃ n, s ∩ t n := by rw [← inter_iUnion] exact Subset.antisymm (subset_inter Subset.rfl t_cover) inter_subset_left calc (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) = ∑' n, ∫⁻ x in s ∩ t n, ENNReal.ofReal \|(f' x).det\| ∂μ := by conv_lhs => rw [s_eq] rw [lintegral_iUnion] · exact fun n => hs.inter (t_meas n) · exact pairwise_disjoint_mono t_disj fun n => inter_subset_right _ ≤ ∑' n, ∫⁻ _ in s ∩ t n, ENNReal.ofReal \|(A n).det\| + ε ∂μ := by apply ENNReal.tsum_le_tsum fun n => ?_ apply lintegral_mono_ae filter_upwards [(ht n).norm_fderiv_sub_le μ (hs.inter (t_meas n)) f' fun x hx => (hf' x hx.1).mono inter_subset_left] intro x hx have I : \|(f' x).det\| ≤ \|(A n).det\| + ε := calc \|(f' x).det\| = \|(A n).det + ((f' x).det - (A n).det)\| := by congr 1; abel _ ≤ \|(A n).det\| + \|(f' x).det - (A n).det\| := abs_add _ _ _ ≤ \|(A n).det\| + ε := add_le_add le_rfl ((hδ (A n)).2.1 _ hx) calc ENNReal.ofReal \|(f' x).det\| ≤ ENNReal.ofReal (\|(A n).det\| + ε) := ENNReal.ofReal_le_ofReal I _ = ENNReal.ofReal \|(A n).det\| + ε := by simp only [ENNReal.ofReal_add, abs_nonneg, NNReal.zero_le_coe, ENNReal.ofReal_coe_nnreal] _ = ∑' n, (ENNReal.ofReal \|(A n).det\| * μ (s ∩ t n) + ε * μ (s ∩ t n)) := by simp only [set_lintegral_const, lintegral_add_right _ measurable_const] _ ≤ ∑' n, (μ (f '' (s ∩ t n)) + ε * μ (s ∩ t n) + ε * μ (s ∩ t n)) := by gcongr exact (hδ (A _)).2.2 _ _ (ht _) _ = μ (f '' s) + 2 * ε * μ s := by conv_rhs => rw [s_eq] rw [image_iUnion, measure_iUnion]; rotate_left · intro i j hij apply Disjoint.image _ hf inter_subset_left inter_subset_left exact Disjoint.mono inter_subset_right inter_subset_right (t_disj hij) · intro i exact measurable_image_of_fderivWithin (hs.inter (t_meas i)) (fun x hx => (hf' x hx.1).mono inter_subset_left) (hf.mono inter_subset_left) rw [measure_iUnion]; rotate_left · exact pairwise_disjoint_mono t_disj fun i => inter_subset_right · exact fun i => hs.inter (t_meas i) rw [← ENNReal.tsum_mul_left, ← ENNReal.tsum_add] congr 1 ext1 i rw [mul_assoc, two_mul, add_assoc] #align measure_theory.lintegral_abs_det_fderiv_le_add_haar_image_aux1 MeasureTheory.lintegral_abs_det_fderiv_le_addHaar_image_aux1 theorem lintegral_abs_det_fderiv_le_addHaar_image_aux2 (hs : MeasurableSet s) (h's : μ s ≠ ∞) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) : (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) ≤ μ (f '' s) := by -- We just need to let the error tend to `0` in the previous lemma. have : Tendsto (fun ε : ℝ≥0 => μ (f '' s) + 2 * ε * μ s) (𝓝[>] 0) (𝓝 (μ (f '' s) + 2 * (0 : ℝ≥0) * μ s)) := by apply Tendsto.mono_left _ nhdsWithin_le_nhds refine tendsto_const_nhds.add ?_ refine ENNReal.Tendsto.mul_const ?_ (Or.inr h's) exact ENNReal.Tendsto.const_mul (ENNReal.tendsto_coe.2 tendsto_id) (Or.inr ENNReal.coe_ne_top) simp only [add_zero, zero_mul, mul_zero, ENNReal.coe_zero] at this apply ge_of_tendsto this filter_upwards [self_mem_nhdsWithin] intro ε εpos rw [mem_Ioi] at εpos exact lintegral_abs_det_fderiv_le_addHaar_image_aux1 μ hs hf' hf εpos #align measure_theory.lintegral_abs_det_fderiv_le_add_haar_image_aux2 MeasureTheory.lintegral_abs_det_fderiv_le_addHaar_image_aux2 theorem lintegral_abs_det_fderiv_le_addHaar_image (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) : (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) ≤ μ (f '' s) := by let u n := disjointed (spanningSets μ) n have u_meas : ∀ n, MeasurableSet (u n) := by intro n apply MeasurableSet.disjointed fun i => ?_ exact measurable_spanningSets μ i have A : s = ⋃ n, s ∩ u n := by rw [← inter_iUnion, iUnion_disjointed, iUnion_spanningSets, inter_univ] calc (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) = ∑' n, ∫⁻ x in s ∩ u n, ENNReal.ofReal \|(f' x).det\| ∂μ := by conv_lhs => rw [A] rw [lintegral_iUnion] · intro n; exact hs.inter (u_meas n) · exact pairwise_disjoint_mono (disjoint_disjointed _) fun n => inter_subset_right _ ≤ ∑' n, μ (f '' (s ∩ u n)) := by apply ENNReal.tsum_le_tsum fun n => ?_ apply lintegral_abs_det_fderiv_le_addHaar_image_aux2 μ (hs.inter (u_meas n)) _ (fun x hx => (hf' x hx.1).mono inter_subset_left) (hf.mono inter_subset_left) have : μ (u n) < ∞ := lt_of_le_of_lt (measure_mono (disjointed_subset _ _)) (measure_spanningSets_lt_top μ n) exact ne_of_lt (lt_of_le_of_lt (measure_mono inter_subset_right) this) _ = μ (f '' s) := by conv_rhs => rw [A, image_iUnion] rw [measure_iUnion] · intro i j hij apply Disjoint.image _ hf inter_subset_left inter_subset_left exact Disjoint.mono inter_subset_right inter_subset_right (disjoint_disjointed _ hij) · intro i exact measurable_image_of_fderivWithin (hs.inter (u_meas i)) (fun x hx => (hf' x hx.1).mono inter_subset_left) (hf.mono inter_subset_left) #align measure_theory.lintegral_abs_det_fderiv_le_add_haar_image MeasureTheory.lintegral_abs_det_fderiv_le_addHaar_image theorem lintegral_abs_det_fderiv_eq_addHaar_image (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) : (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) = μ (f '' s) := le_antisymm (lintegral_abs_det_fderiv_le_addHaar_image μ hs hf' hf) (addHaar_image_le_lintegral_abs_det_fderiv μ hs hf') #align measure_theory.lintegral_abs_det_fderiv_eq_add_haar_image MeasureTheory.lintegral_abs_det_fderiv_eq_addHaar_image theorem map_withDensity_abs_det_fderiv_eq_addHaar (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) (h'f : Measurable f) : Measure.map f ((μ.restrict s).withDensity fun x => ENNReal.ofReal \|(f' x).det\|) = μ.restrict (f '' s) := by apply Measure.ext fun t ht => ?_ rw [map_apply h'f ht, withDensity_apply _ (h'f ht), Measure.restrict_apply ht, restrict_restrict (h'f ht), lintegral_abs_det_fderiv_eq_addHaar_image μ ((h'f ht).inter hs) (fun x hx => (hf' x hx.2).mono inter_subset_right) (hf.mono inter_subset_right), image_preimage_inter] #align measure_theory.map_with_density_abs_det_fderiv_eq_add_haar MeasureTheory.map_withDensity_abs_det_fderiv_eq_addHaar theorem restrict_map_withDensity_abs_det_fderiv_eq_addHaar (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) : Measure.map (s.restrict f) (comap (↑) (μ.withDensity fun x => ENNReal.ofReal \|(f' x).det\|)) = μ.restrict (f '' s) := by obtain ⟨u, u_meas, uf⟩ : ∃ u, Measurable u ∧ EqOn u f s := by classical refine ⟨piecewise s f 0, ?_, piecewise_eqOn _ _ _⟩ refine ContinuousOn.measurable_piecewise ?_ continuous_zero.continuousOn hs have : DifferentiableOn ℝ f s := fun x hx => (hf' x hx).differentiableWithinAt exact this.continuousOn have u' : ∀ x ∈ s, HasFDerivWithinAt u (f' x) s x := fun x hx => (hf' x hx).congr (fun y hy => uf hy) (uf hx) set F : s → E := u ∘ (↑) with hF have A : Measure.map F (comap (↑) (μ.withDensity fun x => ENNReal.ofReal \|(f' x).det\|)) = μ.restrict (u '' s) := by rw [hF, ← Measure.map_map u_meas measurable_subtype_coe, map_comap_subtype_coe hs, restrict_withDensity hs] exact map_withDensity_abs_det_fderiv_eq_addHaar μ hs u' (hf.congr uf.symm) u_meas rw [uf.image_eq] at A have : F = s.restrict f := by ext x exact uf x.2 rwa [this] at A #align measure_theory.restrict_map_with_density_abs_det_fderiv_eq_add_haar MeasureTheory.restrict_map_withDensity_abs_det_fderiv_eq_addHaar theorem lintegral_image_eq_lintegral_abs_det_fderiv_mul (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) (g : E → ℝ≥0∞) : ∫⁻ x in f '' s, g x ∂μ = ∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| * g (f x) ∂μ := by rw [← restrict_map_withDensity_abs_det_fderiv_eq_addHaar μ hs hf' hf, (measurableEmbedding_of_fderivWithin hs hf' hf).lintegral_map] simp only [Set.restrict_apply, ← Function.comp_apply (f := g)] rw [← (MeasurableEmbedding.subtype_coe hs).lintegral_map, map_comap_subtype_coe hs, set_lintegral_withDensity_eq_set_lintegral_mul_non_measurable₀ _ _ _ hs] · simp only [Pi.mul_apply] · simp only [eventually_true, ENNReal.ofReal_lt_top] · exact aemeasurable_ofReal_abs_det_fderivWithin μ hs hf' #align measure_theory.lintegral_image_eq_lintegral_abs_det_fderiv_mul MeasureTheory.lintegral_image_eq_lintegral_abs_det_fderiv_mul theorem integrableOn_image_iff_integrableOn_abs_det_fderiv_smul (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) (g : E → F) : IntegrableOn g (f '' s) μ ↔ IntegrableOn (fun x => \|(f' x).det\| • g (f x)) s μ := by rw [IntegrableOn, ← restrict_map_withDensity_abs_det_fderiv_eq_addHaar μ hs hf' hf, (measurableEmbedding_of_fderivWithin hs hf' hf).integrable_map_iff] simp only [Set.restrict_eq, ← Function.comp.assoc, ENNReal.ofReal] rw [← (MeasurableEmbedding.subtype_coe hs).integrable_map_iff, map_comap_subtype_coe hs, restrict_withDensity hs, integrable_withDensity_iff_integrable_coe_smul₀] · simp_rw [IntegrableOn, Real.coe_toNNReal _ (abs_nonneg _), Function.comp_apply] · exact aemeasurable_toNNReal_abs_det_fderivWithin μ hs hf' #align measure_theory.integrable_on_image_iff_integrable_on_abs_det_fderiv_smul MeasureTheory.integrableOn_image_iff_integrableOn_abs_det_fderiv_smul theorem integral_image_eq_integral_abs_det_fderiv_smul (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) (g : E → F) : ∫ x in f '' s, g x ∂μ = ∫ x in s, \|(f' x).det\| • g (f x) ∂μ := by rw [← restrict_map_withDensity_abs_det_fderiv_eq_addHaar μ hs hf' hf, (measurableEmbedding_of_fderivWithin hs hf' hf).integral_map] simp only [Set.restrict_apply, ← Function.comp_apply (f := g), ENNReal.ofReal] rw [← (MeasurableEmbedding.subtype_coe hs).integral_map, map_comap_subtype_coe hs, setIntegral_withDensity_eq_setIntegral_smul₀ (aemeasurable_toNNReal_abs_det_fderivWithin μ hs hf') _ hs] congr with x rw [NNReal.smul_def, Real.coe_toNNReal _ (abs_nonneg (f' x).det)] #align measure_theory.integral_image_eq_integral_abs_det_fderiv_smul MeasureTheory.integral_image_eq_integral_abs_det_fderiv_smul -- Porting note: move this to `Topology.Algebra.Module.Basic` when port is over theorem det_one_smulRight {𝕜 : Type*} [NormedField 𝕜] (v : 𝕜) : ((1 : 𝕜 →L[𝕜] 𝕜).smulRight v).det = v := by have : (1 : 𝕜 →L[𝕜] 𝕜).smulRight v = v • (1 : 𝕜 →L[𝕜] 𝕜) := by ext1 simp only [ContinuousLinearMap.smulRight_apply, ContinuousLinearMap.one_apply, Algebra.id.smul_eq_mul, one_mul, ContinuousLinearMap.coe_smul', Pi.smul_apply, mul_one] rw [this, ContinuousLinearMap.det, ContinuousLinearMap.coe_smul, ContinuousLinearMap.one_def, ContinuousLinearMap.coe_id, LinearMap.det_smul, FiniteDimensional.finrank_self, LinearMap.det_id, pow_one, mul_one] #align measure_theory.det_one_smul_right MeasureTheory.det_one_smulRight theorem integrableOn_image_iff_integrableOn_abs_deriv_smul {s : Set ℝ} {f : ℝ → ℝ} {f' : ℝ → ℝ} (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasDerivWithinAt f (f' x) s x) (hf : InjOn f s) (g : ℝ → F) : IntegrableOn g (f '' s) ↔ IntegrableOn (fun x => \|f' x\| • g (f x)) s := by simpa only [det_one_smulRight] using integrableOn_image_iff_integrableOn_abs_det_fderiv_smul volume hs (fun x hx => (hf' x hx).hasFDerivWithinAt) hf g #align measure_theory.integrable_on_image_iff_integrable_on_abs_deriv_smul MeasureTheory.integrableOn_image_iff_integrableOn_abs_deriv_smul	Mathlib/MeasureTheory/Function/Jacobian.lean	1,233	1,238	theorem integral_image_eq_integral_abs_deriv_smul {s : Set ℝ} {f : ℝ → ℝ} {f' : ℝ → ℝ} (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasDerivWithinAt f (f' x) s x) (hf : InjOn f s) (g : ℝ → F) : ∫ x in f '' s, g x = ∫ x in s, \|f' x\| • g (f x) := by	simpa only [det_one_smulRight] using integral_image_eq_integral_abs_det_fderiv_smul volume hs (fun x hx => (hf' x hx).hasFDerivWithinAt) hf g
import Mathlib.Data.Multiset.Nodup #align_import data.multiset.dedup from "leanprover-community/mathlib"@"9003f28797c0664a49e4179487267c494477d853" namespace Multiset open List variable {α β : Type*} [DecidableEq α] def dedup (s : Multiset α) : Multiset α := Quot.liftOn s (fun l => (l.dedup : Multiset α)) fun _ _ p => Quot.sound p.dedup #align multiset.dedup Multiset.dedup @[simp] theorem coe_dedup (l : List α) : @dedup α _ l = l.dedup := rfl #align multiset.coe_dedup Multiset.coe_dedup @[simp] theorem dedup_zero : @dedup α _ 0 = 0 := rfl #align multiset.dedup_zero Multiset.dedup_zero @[simp] theorem mem_dedup {a : α} {s : Multiset α} : a ∈ dedup s ↔ a ∈ s := Quot.induction_on s fun _ => List.mem_dedup #align multiset.mem_dedup Multiset.mem_dedup @[simp] theorem dedup_cons_of_mem {a : α} {s : Multiset α} : a ∈ s → dedup (a ::ₘ s) = dedup s := Quot.induction_on s fun _ m => @congr_arg _ _ _ _ ofList <\| List.dedup_cons_of_mem m #align multiset.dedup_cons_of_mem Multiset.dedup_cons_of_mem @[simp] theorem dedup_cons_of_not_mem {a : α} {s : Multiset α} : a ∉ s → dedup (a ::ₘ s) = a ::ₘ dedup s := Quot.induction_on s fun _ m => congr_arg ofList <\| List.dedup_cons_of_not_mem m #align multiset.dedup_cons_of_not_mem Multiset.dedup_cons_of_not_mem theorem dedup_le (s : Multiset α) : dedup s ≤ s := Quot.induction_on s fun _ => (dedup_sublist _).subperm #align multiset.dedup_le Multiset.dedup_le theorem dedup_subset (s : Multiset α) : dedup s ⊆ s := subset_of_le <\| dedup_le _ #align multiset.dedup_subset Multiset.dedup_subset theorem subset_dedup (s : Multiset α) : s ⊆ dedup s := fun _ => mem_dedup.2 #align multiset.subset_dedup Multiset.subset_dedup @[simp] theorem dedup_subset' {s t : Multiset α} : dedup s ⊆ t ↔ s ⊆ t := ⟨Subset.trans (subset_dedup _), Subset.trans (dedup_subset _)⟩ #align multiset.dedup_subset' Multiset.dedup_subset' @[simp] theorem subset_dedup' {s t : Multiset α} : s ⊆ dedup t ↔ s ⊆ t := ⟨fun h => Subset.trans h (dedup_subset _), fun h => Subset.trans h (subset_dedup _)⟩ #align multiset.subset_dedup' Multiset.subset_dedup' @[simp] theorem nodup_dedup (s : Multiset α) : Nodup (dedup s) := Quot.induction_on s List.nodup_dedup #align multiset.nodup_dedup Multiset.nodup_dedup theorem dedup_eq_self {s : Multiset α} : dedup s = s ↔ Nodup s := ⟨fun e => e ▸ nodup_dedup s, Quot.induction_on s fun _ h => congr_arg ofList h.dedup⟩ #align multiset.dedup_eq_self Multiset.dedup_eq_self alias ⟨_, Nodup.dedup⟩ := dedup_eq_self #align multiset.nodup.dedup Multiset.Nodup.dedup theorem count_dedup (m : Multiset α) (a : α) : m.dedup.count a = if a ∈ m then 1 else 0 := Quot.induction_on m fun _ => by simp only [quot_mk_to_coe'', coe_dedup, mem_coe, List.mem_dedup, coe_nodup, coe_count] apply List.count_dedup _ _ #align multiset.count_dedup Multiset.count_dedup @[simp] theorem dedup_idem {m : Multiset α} : m.dedup.dedup = m.dedup := Quot.induction_on m fun _ => @congr_arg _ _ _ _ ofList List.dedup_idem #align multiset.dedup_idempotent Multiset.dedup_idem theorem dedup_eq_zero {s : Multiset α} : dedup s = 0 ↔ s = 0 := ⟨fun h => eq_zero_of_subset_zero <\| h ▸ subset_dedup _, fun h => h.symm ▸ dedup_zero⟩ #align multiset.dedup_eq_zero Multiset.dedup_eq_zero @[simp] theorem dedup_singleton {a : α} : dedup ({a} : Multiset α) = {a} := (nodup_singleton _).dedup #align multiset.dedup_singleton Multiset.dedup_singleton theorem le_dedup {s t : Multiset α} : s ≤ dedup t ↔ s ≤ t ∧ Nodup s := ⟨fun h => ⟨le_trans h (dedup_le _), nodup_of_le h (nodup_dedup _)⟩, fun ⟨l, d⟩ => (le_iff_subset d).2 <\| Subset.trans (subset_of_le l) (subset_dedup _)⟩ #align multiset.le_dedup Multiset.le_dedup theorem le_dedup_self {s : Multiset α} : s ≤ dedup s ↔ Nodup s := by rw [le_dedup, and_iff_right le_rfl] #align multiset.le_dedup_self Multiset.le_dedup_self theorem dedup_ext {s t : Multiset α} : dedup s = dedup t ↔ ∀ a, a ∈ s ↔ a ∈ t := by simp [Nodup.ext] #align multiset.dedup_ext Multiset.dedup_ext	Mathlib/Data/Multiset/Dedup.lean	120	122	theorem dedup_map_dedup_eq [DecidableEq β] (f : α → β) (s : Multiset α) : dedup (map f (dedup s)) = dedup (map f s) := by	simp [dedup_ext]
import Mathlib.Algebra.Homology.ShortComplex.ModuleCat import Mathlib.RepresentationTheory.GroupCohomology.Basic import Mathlib.RepresentationTheory.Invariants universe v u noncomputable section open CategoryTheory Limits Representation variable {k G : Type u} [CommRing k] [Group G] (A : Rep k G) namespace groupCohomology section IsCocycle section variable {G A : Type} [Mul G] [AddCommGroup A] [SMul G A] def IsOneCocycle (f : G → A) : Prop := ∀ g h : G, f (g h) = g • f h + f g def IsTwoCocycle (f : G × G → A) : Prop := ∀ g h j : G, f (g * h, j) + f (g, h) = g • (f (h, j)) + f (g, h * j) end section variable {G A : Type*} [Monoid G] [AddCommGroup A] [MulAction G A] theorem map_one_of_isOneCocycle {f : G → A} (hf : IsOneCocycle f) : f 1 = 0 := by simpa only [mul_one, one_smul, self_eq_add_right] using hf 1 1 theorem map_one_fst_of_isTwoCocycle {f : G × G → A} (hf : IsTwoCocycle f) (g : G) : f (1, g) = f (1, 1) := by simpa only [one_smul, one_mul, mul_one, add_right_inj] using (hf 1 1 g).symm	Mathlib/RepresentationTheory/GroupCohomology/LowDegree.lean	409	411	theorem map_one_snd_of_isTwoCocycle {f : G × G → A} (hf : IsTwoCocycle f) (g : G) : f (g, 1) = g • f (1, 1) := by	simpa only [mul_one, add_left_inj] using hf g 1 1
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]	Mathlib/Tactic/Ring/Basic.lean	320	322	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]
import Mathlib.Analysis.InnerProductSpace.Basic import Mathlib.Analysis.SpecialFunctions.Trigonometric.Inverse #align_import geometry.euclidean.angle.unoriented.basic from "leanprover-community/mathlib"@"46b633fd842bef9469441c0209906f6dddd2b4f5" assert_not_exists HasFDerivAt assert_not_exists ConformalAt noncomputable section open Real Set open Real open RealInnerProductSpace namespace InnerProductGeometry variable {V : Type} [NormedAddCommGroup V] [InnerProductSpace ℝ V] {x y : V} def angle (x y : V) : ℝ := Real.arccos (⟪x, y⟫ / (‖x‖ ‖y‖)) #align inner_product_geometry.angle InnerProductGeometry.angle theorem continuousAt_angle {x : V × V} (hx1 : x.1 ≠ 0) (hx2 : x.2 ≠ 0) : ContinuousAt (fun y : V × V => angle y.1 y.2) x := Real.continuous_arccos.continuousAt.comp <\| continuous_inner.continuousAt.div ((continuous_norm.comp continuous_fst).mul (continuous_norm.comp continuous_snd)).continuousAt (by simp [hx1, hx2]) #align inner_product_geometry.continuous_at_angle InnerProductGeometry.continuousAt_angle theorem angle_smul_smul {c : ℝ} (hc : c ≠ 0) (x y : V) : angle (c • x) (c • y) = angle x y := by have : c * c ≠ 0 := mul_ne_zero hc hc rw [angle, angle, real_inner_smul_left, inner_smul_right, norm_smul, norm_smul, Real.norm_eq_abs, mul_mul_mul_comm _ ‖x‖, abs_mul_abs_self, ← mul_assoc c c, mul_div_mul_left _ _ this] #align inner_product_geometry.angle_smul_smul InnerProductGeometry.angle_smul_smul @[simp] theorem _root_.LinearIsometry.angle_map {E F : Type} [NormedAddCommGroup E] [NormedAddCommGroup F] [InnerProductSpace ℝ E] [InnerProductSpace ℝ F] (f : E →ₗᵢ[ℝ] F) (u v : E) : angle (f u) (f v) = angle u v := by rw [angle, angle, f.inner_map_map, f.norm_map, f.norm_map] #align linear_isometry.angle_map LinearIsometry.angle_map @[simp, norm_cast] theorem _root_.Submodule.angle_coe {s : Submodule ℝ V} (x y : s) : angle (x : V) (y : V) = angle x y := s.subtypeₗᵢ.angle_map x y #align submodule.angle_coe Submodule.angle_coe theorem cos_angle (x y : V) : Real.cos (angle x y) = ⟪x, y⟫ / (‖x‖ ‖y‖) := Real.cos_arccos (abs_le.mp (abs_real_inner_div_norm_mul_norm_le_one x y)).1 (abs_le.mp (abs_real_inner_div_norm_mul_norm_le_one x y)).2 #align inner_product_geometry.cos_angle InnerProductGeometry.cos_angle theorem angle_comm (x y : V) : angle x y = angle y x := by unfold angle rw [real_inner_comm, mul_comm] #align inner_product_geometry.angle_comm InnerProductGeometry.angle_comm @[simp] theorem angle_neg_neg (x y : V) : angle (-x) (-y) = angle x y := by unfold angle rw [inner_neg_neg, norm_neg, norm_neg] #align inner_product_geometry.angle_neg_neg InnerProductGeometry.angle_neg_neg theorem angle_nonneg (x y : V) : 0 ≤ angle x y := Real.arccos_nonneg _ #align inner_product_geometry.angle_nonneg InnerProductGeometry.angle_nonneg theorem angle_le_pi (x y : V) : angle x y ≤ π := Real.arccos_le_pi _ #align inner_product_geometry.angle_le_pi InnerProductGeometry.angle_le_pi theorem angle_neg_right (x y : V) : angle x (-y) = π - angle x y := by unfold angle rw [← Real.arccos_neg, norm_neg, inner_neg_right, neg_div] #align inner_product_geometry.angle_neg_right InnerProductGeometry.angle_neg_right theorem angle_neg_left (x y : V) : angle (-x) y = π - angle x y := by rw [← angle_neg_neg, neg_neg, angle_neg_right] #align inner_product_geometry.angle_neg_left InnerProductGeometry.angle_neg_left proof_wanted angle_triangle (x y z : V) : angle x z ≤ angle x y + angle y z @[simp] theorem angle_zero_left (x : V) : angle 0 x = π / 2 := by unfold angle rw [inner_zero_left, zero_div, Real.arccos_zero] #align inner_product_geometry.angle_zero_left InnerProductGeometry.angle_zero_left @[simp] theorem angle_zero_right (x : V) : angle x 0 = π / 2 := by unfold angle rw [inner_zero_right, zero_div, Real.arccos_zero] #align inner_product_geometry.angle_zero_right InnerProductGeometry.angle_zero_right @[simp] theorem angle_self {x : V} (hx : x ≠ 0) : angle x x = 0 := by unfold angle rw [← real_inner_self_eq_norm_mul_norm, div_self (inner_self_ne_zero.2 hx : ⟪x, x⟫ ≠ 0), Real.arccos_one] #align inner_product_geometry.angle_self InnerProductGeometry.angle_self @[simp] theorem angle_self_neg_of_nonzero {x : V} (hx : x ≠ 0) : angle x (-x) = π := by rw [angle_neg_right, angle_self hx, sub_zero] #align inner_product_geometry.angle_self_neg_of_nonzero InnerProductGeometry.angle_self_neg_of_nonzero @[simp] theorem angle_neg_self_of_nonzero {x : V} (hx : x ≠ 0) : angle (-x) x = π := by rw [angle_comm, angle_self_neg_of_nonzero hx] #align inner_product_geometry.angle_neg_self_of_nonzero InnerProductGeometry.angle_neg_self_of_nonzero @[simp] theorem angle_smul_right_of_pos (x y : V) {r : ℝ} (hr : 0 < r) : angle x (r • y) = angle x y := by unfold angle rw [inner_smul_right, norm_smul, Real.norm_eq_abs, abs_of_nonneg (le_of_lt hr), ← mul_assoc, mul_comm _ r, mul_assoc, mul_div_mul_left _ _ (ne_of_gt hr)] #align inner_product_geometry.angle_smul_right_of_pos InnerProductGeometry.angle_smul_right_of_pos @[simp] theorem angle_smul_left_of_pos (x y : V) {r : ℝ} (hr : 0 < r) : angle (r • x) y = angle x y := by rw [angle_comm, angle_smul_right_of_pos y x hr, angle_comm] #align inner_product_geometry.angle_smul_left_of_pos InnerProductGeometry.angle_smul_left_of_pos @[simp] theorem angle_smul_right_of_neg (x y : V) {r : ℝ} (hr : r < 0) : angle x (r • y) = angle x (-y) := by rw [← neg_neg r, neg_smul, angle_neg_right, angle_smul_right_of_pos x y (neg_pos_of_neg hr), angle_neg_right] #align inner_product_geometry.angle_smul_right_of_neg InnerProductGeometry.angle_smul_right_of_neg @[simp] theorem angle_smul_left_of_neg (x y : V) {r : ℝ} (hr : r < 0) : angle (r • x) y = angle (-x) y := by rw [angle_comm, angle_smul_right_of_neg y x hr, angle_comm] #align inner_product_geometry.angle_smul_left_of_neg InnerProductGeometry.angle_smul_left_of_neg theorem cos_angle_mul_norm_mul_norm (x y : V) : Real.cos (angle x y) * (‖x‖ * ‖y‖) = ⟪x, y⟫ := by rw [cos_angle, div_mul_cancel_of_imp] simp (config := { contextual := true }) [or_imp] #align inner_product_geometry.cos_angle_mul_norm_mul_norm InnerProductGeometry.cos_angle_mul_norm_mul_norm theorem sin_angle_mul_norm_mul_norm (x y : V) : Real.sin (angle x y) * (‖x‖ * ‖y‖) = √(⟪x, x⟫ * ⟪y, y⟫ - ⟪x, y⟫ * ⟪x, y⟫) := by unfold angle rw [Real.sin_arccos, ← Real.sqrt_mul_self (mul_nonneg (norm_nonneg x) (norm_nonneg y)), ← Real.sqrt_mul' _ (mul_self_nonneg _), sq, Real.sqrt_mul_self (mul_nonneg (norm_nonneg x) (norm_nonneg y)), real_inner_self_eq_norm_mul_norm, real_inner_self_eq_norm_mul_norm] by_cases h : ‖x‖ * ‖y‖ = 0 · rw [show ‖x‖ * ‖x‖ * (‖y‖ * ‖y‖) = ‖x‖ * ‖y‖ * (‖x‖ * ‖y‖) by ring, h, mul_zero, mul_zero, zero_sub] cases' eq_zero_or_eq_zero_of_mul_eq_zero h with hx hy · rw [norm_eq_zero] at hx rw [hx, inner_zero_left, zero_mul, neg_zero] · rw [norm_eq_zero] at hy rw [hy, inner_zero_right, zero_mul, neg_zero] · field_simp [h] ring_nf #align inner_product_geometry.sin_angle_mul_norm_mul_norm InnerProductGeometry.sin_angle_mul_norm_mul_norm theorem angle_eq_zero_iff {x y : V} : angle x y = 0 ↔ x ≠ 0 ∧ ∃ r : ℝ, 0 < r ∧ y = r • x := by rw [angle, ← real_inner_div_norm_mul_norm_eq_one_iff, Real.arccos_eq_zero, LE.le.le_iff_eq, eq_comm] exact (abs_le.mp (abs_real_inner_div_norm_mul_norm_le_one x y)).2 #align inner_product_geometry.angle_eq_zero_iff InnerProductGeometry.angle_eq_zero_iff theorem angle_eq_pi_iff {x y : V} : angle x y = π ↔ x ≠ 0 ∧ ∃ r : ℝ, r < 0 ∧ y = r • x := by rw [angle, ← real_inner_div_norm_mul_norm_eq_neg_one_iff, Real.arccos_eq_pi, LE.le.le_iff_eq] exact (abs_le.mp (abs_real_inner_div_norm_mul_norm_le_one x y)).1 #align inner_product_geometry.angle_eq_pi_iff InnerProductGeometry.angle_eq_pi_iff theorem angle_add_angle_eq_pi_of_angle_eq_pi {x y : V} (z : V) (h : angle x y = π) : angle x z + angle y z = π := by rcases angle_eq_pi_iff.1 h with ⟨_, ⟨r, ⟨hr, rfl⟩⟩⟩ rw [angle_smul_left_of_neg x z hr, angle_neg_left, add_sub_cancel] #align inner_product_geometry.angle_add_angle_eq_pi_of_angle_eq_pi InnerProductGeometry.angle_add_angle_eq_pi_of_angle_eq_pi theorem inner_eq_zero_iff_angle_eq_pi_div_two (x y : V) : ⟪x, y⟫ = 0 ↔ angle x y = π / 2 := Iff.symm <\| by simp (config := { contextual := true }) [angle, or_imp] #align inner_product_geometry.inner_eq_zero_iff_angle_eq_pi_div_two InnerProductGeometry.inner_eq_zero_iff_angle_eq_pi_div_two theorem inner_eq_neg_mul_norm_of_angle_eq_pi {x y : V} (h : angle x y = π) : ⟪x, y⟫ = -(‖x‖ * ‖y‖) := by simp [← cos_angle_mul_norm_mul_norm, h] #align inner_product_geometry.inner_eq_neg_mul_norm_of_angle_eq_pi InnerProductGeometry.inner_eq_neg_mul_norm_of_angle_eq_pi theorem inner_eq_mul_norm_of_angle_eq_zero {x y : V} (h : angle x y = 0) : ⟪x, y⟫ = ‖x‖ * ‖y‖ := by simp [← cos_angle_mul_norm_mul_norm, h] #align inner_product_geometry.inner_eq_mul_norm_of_angle_eq_zero InnerProductGeometry.inner_eq_mul_norm_of_angle_eq_zero theorem inner_eq_neg_mul_norm_iff_angle_eq_pi {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : ⟪x, y⟫ = -(‖x‖ * ‖y‖) ↔ angle x y = π := by refine ⟨fun h => ?_, inner_eq_neg_mul_norm_of_angle_eq_pi⟩ have h₁ : ‖x‖ * ‖y‖ ≠ 0 := (mul_pos (norm_pos_iff.mpr hx) (norm_pos_iff.mpr hy)).ne' rw [angle, h, neg_div, div_self h₁, Real.arccos_neg_one] #align inner_product_geometry.inner_eq_neg_mul_norm_iff_angle_eq_pi InnerProductGeometry.inner_eq_neg_mul_norm_iff_angle_eq_pi theorem inner_eq_mul_norm_iff_angle_eq_zero {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : ⟪x, y⟫ = ‖x‖ * ‖y‖ ↔ angle x y = 0 := by refine ⟨fun h => ?_, inner_eq_mul_norm_of_angle_eq_zero⟩ have h₁ : ‖x‖ * ‖y‖ ≠ 0 := (mul_pos (norm_pos_iff.mpr hx) (norm_pos_iff.mpr hy)).ne' rw [angle, h, div_self h₁, Real.arccos_one] #align inner_product_geometry.inner_eq_mul_norm_iff_angle_eq_zero InnerProductGeometry.inner_eq_mul_norm_iff_angle_eq_zero theorem norm_sub_eq_add_norm_of_angle_eq_pi {x y : V} (h : angle x y = π) : ‖x - y‖ = ‖x‖ + ‖y‖ := by rw [← sq_eq_sq (norm_nonneg (x - y)) (add_nonneg (norm_nonneg x) (norm_nonneg y)), norm_sub_pow_two_real, inner_eq_neg_mul_norm_of_angle_eq_pi h] ring #align inner_product_geometry.norm_sub_eq_add_norm_of_angle_eq_pi InnerProductGeometry.norm_sub_eq_add_norm_of_angle_eq_pi theorem norm_add_eq_add_norm_of_angle_eq_zero {x y : V} (h : angle x y = 0) : ‖x + y‖ = ‖x‖ + ‖y‖ := by rw [← sq_eq_sq (norm_nonneg (x + y)) (add_nonneg (norm_nonneg x) (norm_nonneg y)), norm_add_pow_two_real, inner_eq_mul_norm_of_angle_eq_zero h] ring #align inner_product_geometry.norm_add_eq_add_norm_of_angle_eq_zero InnerProductGeometry.norm_add_eq_add_norm_of_angle_eq_zero theorem norm_sub_eq_abs_sub_norm_of_angle_eq_zero {x y : V} (h : angle x y = 0) : ‖x - y‖ = \|‖x‖ - ‖y‖\| := by rw [← sq_eq_sq (norm_nonneg (x - y)) (abs_nonneg (‖x‖ - ‖y‖)), norm_sub_pow_two_real, inner_eq_mul_norm_of_angle_eq_zero h, sq_abs (‖x‖ - ‖y‖)] ring #align inner_product_geometry.norm_sub_eq_abs_sub_norm_of_angle_eq_zero InnerProductGeometry.norm_sub_eq_abs_sub_norm_of_angle_eq_zero theorem norm_sub_eq_add_norm_iff_angle_eq_pi {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : ‖x - y‖ = ‖x‖ + ‖y‖ ↔ angle x y = π := by refine ⟨fun h => ?_, norm_sub_eq_add_norm_of_angle_eq_pi⟩ rw [← inner_eq_neg_mul_norm_iff_angle_eq_pi hx hy] obtain ⟨hxy₁, hxy₂⟩ := norm_nonneg (x - y), add_nonneg (norm_nonneg x) (norm_nonneg y) rw [← sq_eq_sq hxy₁ hxy₂, norm_sub_pow_two_real] at h calc ⟪x, y⟫ = (‖x‖ ^ 2 + ‖y‖ ^ 2 - (‖x‖ + ‖y‖) ^ 2) / 2 := by linarith _ = -(‖x‖ * ‖y‖) := by ring #align inner_product_geometry.norm_sub_eq_add_norm_iff_angle_eq_pi InnerProductGeometry.norm_sub_eq_add_norm_iff_angle_eq_pi theorem norm_add_eq_add_norm_iff_angle_eq_zero {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : ‖x + y‖ = ‖x‖ + ‖y‖ ↔ angle x y = 0 := by refine ⟨fun h => ?_, norm_add_eq_add_norm_of_angle_eq_zero⟩ rw [← inner_eq_mul_norm_iff_angle_eq_zero hx hy] obtain ⟨hxy₁, hxy₂⟩ := norm_nonneg (x + y), add_nonneg (norm_nonneg x) (norm_nonneg y) rw [← sq_eq_sq hxy₁ hxy₂, norm_add_pow_two_real] at h calc ⟪x, y⟫ = ((‖x‖ + ‖y‖) ^ 2 - ‖x‖ ^ 2 - ‖y‖ ^ 2) / 2 := by linarith _ = ‖x‖ * ‖y‖ := by ring #align inner_product_geometry.norm_add_eq_add_norm_iff_angle_eq_zero InnerProductGeometry.norm_add_eq_add_norm_iff_angle_eq_zero theorem norm_sub_eq_abs_sub_norm_iff_angle_eq_zero {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : ‖x - y‖ = \|‖x‖ - ‖y‖\| ↔ angle x y = 0 := by refine ⟨fun h => ?_, norm_sub_eq_abs_sub_norm_of_angle_eq_zero⟩ rw [← inner_eq_mul_norm_iff_angle_eq_zero hx hy] have h1 : ‖x - y‖ ^ 2 = (‖x‖ - ‖y‖) ^ 2 := by rw [h] exact sq_abs (‖x‖ - ‖y‖) rw [norm_sub_pow_two_real] at h1 calc ⟪x, y⟫ = ((‖x‖ + ‖y‖) ^ 2 - ‖x‖ ^ 2 - ‖y‖ ^ 2) / 2 := by linarith _ = ‖x‖ * ‖y‖ := by ring #align inner_product_geometry.norm_sub_eq_abs_sub_norm_iff_angle_eq_zero InnerProductGeometry.norm_sub_eq_abs_sub_norm_iff_angle_eq_zero theorem norm_add_eq_norm_sub_iff_angle_eq_pi_div_two (x y : V) : ‖x + y‖ = ‖x - y‖ ↔ angle x y = π / 2 := by rw [← sq_eq_sq (norm_nonneg (x + y)) (norm_nonneg (x - y)), ← inner_eq_zero_iff_angle_eq_pi_div_two x y, norm_add_pow_two_real, norm_sub_pow_two_real] constructor <;> intro h <;> linarith #align inner_product_geometry.norm_add_eq_norm_sub_iff_angle_eq_pi_div_two InnerProductGeometry.norm_add_eq_norm_sub_iff_angle_eq_pi_div_two theorem cos_eq_one_iff_angle_eq_zero : cos (angle x y) = 1 ↔ angle x y = 0 := by rw [← cos_zero] exact injOn_cos.eq_iff ⟨angle_nonneg x y, angle_le_pi x y⟩ (left_mem_Icc.2 pi_pos.le) #align inner_product_geometry.cos_eq_one_iff_angle_eq_zero InnerProductGeometry.cos_eq_one_iff_angle_eq_zero theorem cos_eq_zero_iff_angle_eq_pi_div_two : cos (angle x y) = 0 ↔ angle x y = π / 2 := by rw [← cos_pi_div_two] apply injOn_cos.eq_iff ⟨angle_nonneg x y, angle_le_pi x y⟩ constructor <;> linarith [pi_pos] #align inner_product_geometry.cos_eq_zero_iff_angle_eq_pi_div_two InnerProductGeometry.cos_eq_zero_iff_angle_eq_pi_div_two theorem cos_eq_neg_one_iff_angle_eq_pi : cos (angle x y) = -1 ↔ angle x y = π := by rw [← cos_pi] exact injOn_cos.eq_iff ⟨angle_nonneg x y, angle_le_pi x y⟩ (right_mem_Icc.2 pi_pos.le) #align inner_product_geometry.cos_eq_neg_one_iff_angle_eq_pi InnerProductGeometry.cos_eq_neg_one_iff_angle_eq_pi theorem sin_eq_zero_iff_angle_eq_zero_or_angle_eq_pi : sin (angle x y) = 0 ↔ angle x y = 0 ∨ angle x y = π := by rw [sin_eq_zero_iff_cos_eq, cos_eq_one_iff_angle_eq_zero, cos_eq_neg_one_iff_angle_eq_pi] #align inner_product_geometry.sin_eq_zero_iff_angle_eq_zero_or_angle_eq_pi InnerProductGeometry.sin_eq_zero_iff_angle_eq_zero_or_angle_eq_pi	Mathlib/Geometry/Euclidean/Angle/Unoriented/Basic.lean	371	374	theorem sin_eq_one_iff_angle_eq_pi_div_two : sin (angle x y) = 1 ↔ angle x y = π / 2 := by	refine ⟨fun h => ?_, fun h => by rw [h, sin_pi_div_two]⟩ rw [← cos_eq_zero_iff_angle_eq_pi_div_two, ← abs_eq_zero, abs_cos_eq_sqrt_one_sub_sin_sq, h] simp
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 PiLike open ContinuousLinearMap variable {𝕜 ι H : Type*} [RCLike 𝕜] [NormedAddCommGroup H] [NormedSpace 𝕜 H] [Fintype ι] {f : H → EuclideanSpace 𝕜 ι} {f' : H →L[𝕜] EuclideanSpace 𝕜 ι} {t : Set H} {y : H} theorem differentiableWithinAt_euclidean : DifferentiableWithinAt 𝕜 f t y ↔ ∀ i, DifferentiableWithinAt 𝕜 (fun x => f x i) t y := by rw [← (EuclideanSpace.equiv ι 𝕜).comp_differentiableWithinAt_iff, differentiableWithinAt_pi] rfl #align differentiable_within_at_euclidean differentiableWithinAt_euclidean theorem differentiableAt_euclidean : DifferentiableAt 𝕜 f y ↔ ∀ i, DifferentiableAt 𝕜 (fun x => f x i) y := by rw [← (EuclideanSpace.equiv ι 𝕜).comp_differentiableAt_iff, differentiableAt_pi] rfl #align differentiable_at_euclidean differentiableAt_euclidean	Mathlib/Analysis/InnerProductSpace/Calculus.lean	322	325	theorem differentiableOn_euclidean : DifferentiableOn 𝕜 f t ↔ ∀ i, DifferentiableOn 𝕜 (fun x => f x i) t := by	rw [← (EuclideanSpace.equiv ι 𝕜).comp_differentiableOn_iff, differentiableOn_pi] rfl
import Mathlib.Combinatorics.SimpleGraph.Subgraph import Mathlib.Data.List.Rotate #align_import combinatorics.simple_graph.connectivity from "leanprover-community/mathlib"@"b99e2d58a5e6861833fa8de11e51a81144258db4" open Function universe u v w namespace SimpleGraph variable {V : Type u} {V' : Type v} {V'' : Type w} variable (G : SimpleGraph V) (G' : SimpleGraph V') (G'' : SimpleGraph V'') inductive Walk : V → V → Type u \| nil {u : V} : Walk u u \| cons {u v w : V} (h : G.Adj u v) (p : Walk v w) : Walk u w deriving DecidableEq #align simple_graph.walk SimpleGraph.Walk attribute [refl] Walk.nil @[simps] instance Walk.instInhabited (v : V) : Inhabited (G.Walk v v) := ⟨Walk.nil⟩ #align simple_graph.walk.inhabited SimpleGraph.Walk.instInhabited @[match_pattern, reducible] def Adj.toWalk {G : SimpleGraph V} {u v : V} (h : G.Adj u v) : G.Walk u v := Walk.cons h Walk.nil #align simple_graph.adj.to_walk SimpleGraph.Adj.toWalk namespace Walk variable {G} @[match_pattern] abbrev nil' (u : V) : G.Walk u u := Walk.nil #align simple_graph.walk.nil' SimpleGraph.Walk.nil' @[match_pattern] abbrev cons' (u v w : V) (h : G.Adj u v) (p : G.Walk v w) : G.Walk u w := Walk.cons h p #align simple_graph.walk.cons' SimpleGraph.Walk.cons' protected def copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : G.Walk u' v' := hu ▸ hv ▸ p #align simple_graph.walk.copy SimpleGraph.Walk.copy @[simp] theorem copy_rfl_rfl {u v} (p : G.Walk u v) : p.copy rfl rfl = p := rfl #align simple_graph.walk.copy_rfl_rfl SimpleGraph.Walk.copy_rfl_rfl @[simp] theorem copy_copy {u v u' v' u'' v''} (p : G.Walk u v) (hu : u = u') (hv : v = v') (hu' : u' = u'') (hv' : v' = v'') : (p.copy hu hv).copy hu' hv' = p.copy (hu.trans hu') (hv.trans hv') := by subst_vars rfl #align simple_graph.walk.copy_copy SimpleGraph.Walk.copy_copy @[simp] theorem copy_nil {u u'} (hu : u = u') : (Walk.nil : G.Walk u u).copy hu hu = Walk.nil := by subst_vars rfl #align simple_graph.walk.copy_nil SimpleGraph.Walk.copy_nil theorem copy_cons {u v w u' w'} (h : G.Adj u v) (p : G.Walk v w) (hu : u = u') (hw : w = w') : (Walk.cons h p).copy hu hw = Walk.cons (hu ▸ h) (p.copy rfl hw) := by subst_vars rfl #align simple_graph.walk.copy_cons SimpleGraph.Walk.copy_cons @[simp] theorem cons_copy {u v w v' w'} (h : G.Adj u v) (p : G.Walk v' w') (hv : v' = v) (hw : w' = w) : Walk.cons h (p.copy hv hw) = (Walk.cons (hv ▸ h) p).copy rfl hw := by subst_vars rfl #align simple_graph.walk.cons_copy SimpleGraph.Walk.cons_copy theorem exists_eq_cons_of_ne {u v : V} (hne : u ≠ v) : ∀ (p : G.Walk u v), ∃ (w : V) (h : G.Adj u w) (p' : G.Walk w v), p = cons h p' \| nil => (hne rfl).elim \| cons h p' => ⟨_, h, p', rfl⟩ #align simple_graph.walk.exists_eq_cons_of_ne SimpleGraph.Walk.exists_eq_cons_of_ne def length {u v : V} : G.Walk u v → ℕ \| nil => 0 \| cons _ q => q.length.succ #align simple_graph.walk.length SimpleGraph.Walk.length @[trans] def append {u v w : V} : G.Walk u v → G.Walk v w → G.Walk u w \| nil, q => q \| cons h p, q => cons h (p.append q) #align simple_graph.walk.append SimpleGraph.Walk.append def concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : G.Walk u w := p.append (cons h nil) #align simple_graph.walk.concat SimpleGraph.Walk.concat theorem concat_eq_append {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : p.concat h = p.append (cons h nil) := rfl #align simple_graph.walk.concat_eq_append SimpleGraph.Walk.concat_eq_append protected def reverseAux {u v w : V} : G.Walk u v → G.Walk u w → G.Walk v w \| nil, q => q \| cons h p, q => Walk.reverseAux p (cons (G.symm h) q) #align simple_graph.walk.reverse_aux SimpleGraph.Walk.reverseAux @[symm] def reverse {u v : V} (w : G.Walk u v) : G.Walk v u := w.reverseAux nil #align simple_graph.walk.reverse SimpleGraph.Walk.reverse def getVert {u v : V} : G.Walk u v → ℕ → V \| nil, _ => u \| cons _ _, 0 => u \| cons _ q, n + 1 => q.getVert n #align simple_graph.walk.get_vert SimpleGraph.Walk.getVert @[simp] theorem getVert_zero {u v} (w : G.Walk u v) : w.getVert 0 = u := by cases w <;> rfl #align simple_graph.walk.get_vert_zero SimpleGraph.Walk.getVert_zero theorem getVert_of_length_le {u v} (w : G.Walk u v) {i : ℕ} (hi : w.length ≤ i) : w.getVert i = v := by induction w generalizing i with \| nil => rfl \| cons _ _ ih => cases i · cases hi · exact ih (Nat.succ_le_succ_iff.1 hi) #align simple_graph.walk.get_vert_of_length_le SimpleGraph.Walk.getVert_of_length_le @[simp] theorem getVert_length {u v} (w : G.Walk u v) : w.getVert w.length = v := w.getVert_of_length_le rfl.le #align simple_graph.walk.get_vert_length SimpleGraph.Walk.getVert_length theorem adj_getVert_succ {u v} (w : G.Walk u v) {i : ℕ} (hi : i < w.length) : G.Adj (w.getVert i) (w.getVert (i + 1)) := by induction w generalizing i with \| nil => cases hi \| cons hxy _ ih => cases i · simp [getVert, hxy] · exact ih (Nat.succ_lt_succ_iff.1 hi) #align simple_graph.walk.adj_get_vert_succ SimpleGraph.Walk.adj_getVert_succ @[simp] theorem cons_append {u v w x : V} (h : G.Adj u v) (p : G.Walk v w) (q : G.Walk w x) : (cons h p).append q = cons h (p.append q) := rfl #align simple_graph.walk.cons_append SimpleGraph.Walk.cons_append @[simp] theorem cons_nil_append {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h nil).append p = cons h p := rfl #align simple_graph.walk.cons_nil_append SimpleGraph.Walk.cons_nil_append @[simp] theorem append_nil {u v : V} (p : G.Walk u v) : p.append nil = p := by induction p with \| nil => rfl \| cons _ _ ih => rw [cons_append, ih] #align simple_graph.walk.append_nil SimpleGraph.Walk.append_nil @[simp] theorem nil_append {u v : V} (p : G.Walk u v) : nil.append p = p := rfl #align simple_graph.walk.nil_append SimpleGraph.Walk.nil_append theorem append_assoc {u v w x : V} (p : G.Walk u v) (q : G.Walk v w) (r : G.Walk w x) : p.append (q.append r) = (p.append q).append r := by induction p with \| nil => rfl \| cons h p' ih => dsimp only [append] rw [ih] #align simple_graph.walk.append_assoc SimpleGraph.Walk.append_assoc @[simp] theorem append_copy_copy {u v w u' v' w'} (p : G.Walk u v) (q : G.Walk v w) (hu : u = u') (hv : v = v') (hw : w = w') : (p.copy hu hv).append (q.copy hv hw) = (p.append q).copy hu hw := by subst_vars rfl #align simple_graph.walk.append_copy_copy SimpleGraph.Walk.append_copy_copy theorem concat_nil {u v : V} (h : G.Adj u v) : nil.concat h = cons h nil := rfl #align simple_graph.walk.concat_nil SimpleGraph.Walk.concat_nil @[simp] theorem concat_cons {u v w x : V} (h : G.Adj u v) (p : G.Walk v w) (h' : G.Adj w x) : (cons h p).concat h' = cons h (p.concat h') := rfl #align simple_graph.walk.concat_cons SimpleGraph.Walk.concat_cons theorem append_concat {u v w x : V} (p : G.Walk u v) (q : G.Walk v w) (h : G.Adj w x) : p.append (q.concat h) = (p.append q).concat h := append_assoc _ _ _ #align simple_graph.walk.append_concat SimpleGraph.Walk.append_concat theorem concat_append {u v w x : V} (p : G.Walk u v) (h : G.Adj v w) (q : G.Walk w x) : (p.concat h).append q = p.append (cons h q) := by rw [concat_eq_append, ← append_assoc, cons_nil_append] #align simple_graph.walk.concat_append SimpleGraph.Walk.concat_append theorem exists_cons_eq_concat {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : ∃ (x : V) (q : G.Walk u x) (h' : G.Adj x w), cons h p = q.concat h' := by induction p generalizing u with \| nil => exact ⟨_, nil, h, rfl⟩ \| cons h' p ih => obtain ⟨y, q, h'', hc⟩ := ih h' refine ⟨y, cons h q, h'', ?_⟩ rw [concat_cons, hc] #align simple_graph.walk.exists_cons_eq_concat SimpleGraph.Walk.exists_cons_eq_concat theorem exists_concat_eq_cons {u v w : V} : ∀ (p : G.Walk u v) (h : G.Adj v w), ∃ (x : V) (h' : G.Adj u x) (q : G.Walk x w), p.concat h = cons h' q \| nil, h => ⟨_, h, nil, rfl⟩ \| cons h' p, h => ⟨_, h', Walk.concat p h, concat_cons _ _ _⟩ #align simple_graph.walk.exists_concat_eq_cons SimpleGraph.Walk.exists_concat_eq_cons @[simp] theorem reverse_nil {u : V} : (nil : G.Walk u u).reverse = nil := rfl #align simple_graph.walk.reverse_nil SimpleGraph.Walk.reverse_nil theorem reverse_singleton {u v : V} (h : G.Adj u v) : (cons h nil).reverse = cons (G.symm h) nil := rfl #align simple_graph.walk.reverse_singleton SimpleGraph.Walk.reverse_singleton @[simp] theorem cons_reverseAux {u v w x : V} (p : G.Walk u v) (q : G.Walk w x) (h : G.Adj w u) : (cons h p).reverseAux q = p.reverseAux (cons (G.symm h) q) := rfl #align simple_graph.walk.cons_reverse_aux SimpleGraph.Walk.cons_reverseAux @[simp] protected theorem append_reverseAux {u v w x : V} (p : G.Walk u v) (q : G.Walk v w) (r : G.Walk u x) : (p.append q).reverseAux r = q.reverseAux (p.reverseAux r) := by induction p with \| nil => rfl \| cons h _ ih => exact ih q (cons (G.symm h) r) #align simple_graph.walk.append_reverse_aux SimpleGraph.Walk.append_reverseAux @[simp] protected theorem reverseAux_append {u v w x : V} (p : G.Walk u v) (q : G.Walk u w) (r : G.Walk w x) : (p.reverseAux q).append r = p.reverseAux (q.append r) := by induction p with \| nil => rfl \| cons h _ ih => simp [ih (cons (G.symm h) q)] #align simple_graph.walk.reverse_aux_append SimpleGraph.Walk.reverseAux_append protected theorem reverseAux_eq_reverse_append {u v w : V} (p : G.Walk u v) (q : G.Walk u w) : p.reverseAux q = p.reverse.append q := by simp [reverse] #align simple_graph.walk.reverse_aux_eq_reverse_append SimpleGraph.Walk.reverseAux_eq_reverse_append @[simp] theorem reverse_cons {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).reverse = p.reverse.append (cons (G.symm h) nil) := by simp [reverse] #align simple_graph.walk.reverse_cons SimpleGraph.Walk.reverse_cons @[simp] theorem reverse_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).reverse = p.reverse.copy hv hu := by subst_vars rfl #align simple_graph.walk.reverse_copy SimpleGraph.Walk.reverse_copy @[simp] theorem reverse_append {u v w : V} (p : G.Walk u v) (q : G.Walk v w) : (p.append q).reverse = q.reverse.append p.reverse := by simp [reverse] #align simple_graph.walk.reverse_append SimpleGraph.Walk.reverse_append @[simp] theorem reverse_concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : (p.concat h).reverse = cons (G.symm h) p.reverse := by simp [concat_eq_append] #align simple_graph.walk.reverse_concat SimpleGraph.Walk.reverse_concat @[simp] theorem reverse_reverse {u v : V} (p : G.Walk u v) : p.reverse.reverse = p := by induction p with \| nil => rfl \| cons _ _ ih => simp [ih] #align simple_graph.walk.reverse_reverse SimpleGraph.Walk.reverse_reverse @[simp] theorem length_nil {u : V} : (nil : G.Walk u u).length = 0 := rfl #align simple_graph.walk.length_nil SimpleGraph.Walk.length_nil @[simp] theorem length_cons {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).length = p.length + 1 := rfl #align simple_graph.walk.length_cons SimpleGraph.Walk.length_cons @[simp] theorem length_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).length = p.length := by subst_vars rfl #align simple_graph.walk.length_copy SimpleGraph.Walk.length_copy @[simp] theorem length_append {u v w : V} (p : G.Walk u v) (q : G.Walk v w) : (p.append q).length = p.length + q.length := by induction p with \| nil => simp \| cons _ _ ih => simp [ih, add_comm, add_left_comm, add_assoc] #align simple_graph.walk.length_append SimpleGraph.Walk.length_append @[simp] theorem length_concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : (p.concat h).length = p.length + 1 := length_append _ _ #align simple_graph.walk.length_concat SimpleGraph.Walk.length_concat @[simp] protected theorem length_reverseAux {u v w : V} (p : G.Walk u v) (q : G.Walk u w) : (p.reverseAux q).length = p.length + q.length := by induction p with \| nil => simp! \| cons _ _ ih => simp [ih, Nat.succ_add, Nat.add_assoc] #align simple_graph.walk.length_reverse_aux SimpleGraph.Walk.length_reverseAux @[simp] theorem length_reverse {u v : V} (p : G.Walk u v) : p.reverse.length = p.length := by simp [reverse] #align simple_graph.walk.length_reverse SimpleGraph.Walk.length_reverse theorem eq_of_length_eq_zero {u v : V} : ∀ {p : G.Walk u v}, p.length = 0 → u = v \| nil, _ => rfl #align simple_graph.walk.eq_of_length_eq_zero SimpleGraph.Walk.eq_of_length_eq_zero theorem adj_of_length_eq_one {u v : V} : ∀ {p : G.Walk u v}, p.length = 1 → G.Adj u v \| cons h nil, _ => h @[simp] theorem exists_length_eq_zero_iff {u v : V} : (∃ p : G.Walk u v, p.length = 0) ↔ u = v := by constructor · rintro ⟨p, hp⟩ exact eq_of_length_eq_zero hp · rintro rfl exact ⟨nil, rfl⟩ #align simple_graph.walk.exists_length_eq_zero_iff SimpleGraph.Walk.exists_length_eq_zero_iff @[simp] theorem length_eq_zero_iff {u : V} {p : G.Walk u u} : p.length = 0 ↔ p = nil := by cases p <;> simp #align simple_graph.walk.length_eq_zero_iff SimpleGraph.Walk.length_eq_zero_iff theorem getVert_append {u v w : V} (p : G.Walk u v) (q : G.Walk v w) (i : ℕ) : (p.append q).getVert i = if i < p.length then p.getVert i else q.getVert (i - p.length) := by induction p generalizing i with \| nil => simp \| cons h p ih => cases i <;> simp [getVert, ih, Nat.succ_lt_succ_iff] theorem getVert_reverse {u v : V} (p : G.Walk u v) (i : ℕ) : p.reverse.getVert i = p.getVert (p.length - i) := by induction p with \| nil => rfl \| cons h p ih => simp only [reverse_cons, getVert_append, length_reverse, ih, length_cons] split_ifs next hi => rw [Nat.succ_sub hi.le] simp [getVert] next hi => obtain rfl \| hi' := Nat.eq_or_lt_of_not_lt hi · simp [getVert] · rw [Nat.eq_add_of_sub_eq (Nat.sub_pos_of_lt hi') rfl, Nat.sub_eq_zero_of_le hi'] simp [getVert] theorem concat_ne_nil {u v : V} (p : G.Walk u v) (h : G.Adj v u) : p.concat h ≠ nil := by cases p <;> simp [concat] #align simple_graph.walk.concat_ne_nil SimpleGraph.Walk.concat_ne_nil theorem concat_inj {u v v' w : V} {p : G.Walk u v} {h : G.Adj v w} {p' : G.Walk u v'} {h' : G.Adj v' w} (he : p.concat h = p'.concat h') : ∃ hv : v = v', p.copy rfl hv = p' := by induction p with \| nil => cases p' · exact ⟨rfl, rfl⟩ · exfalso simp only [concat_nil, concat_cons, cons.injEq] at he obtain ⟨rfl, he⟩ := he simp only [heq_iff_eq] at he exact concat_ne_nil _ _ he.symm \| cons _ _ ih => rw [concat_cons] at he cases p' · exfalso simp only [concat_nil, cons.injEq] at he obtain ⟨rfl, he⟩ := he rw [heq_iff_eq] at he exact concat_ne_nil _ _ he · rw [concat_cons, cons.injEq] at he obtain ⟨rfl, he⟩ := he rw [heq_iff_eq] at he obtain ⟨rfl, rfl⟩ := ih he exact ⟨rfl, rfl⟩ #align simple_graph.walk.concat_inj SimpleGraph.Walk.concat_inj def support {u v : V} : G.Walk u v → List V \| nil => [u] \| cons _ p => u :: p.support #align simple_graph.walk.support SimpleGraph.Walk.support def darts {u v : V} : G.Walk u v → List G.Dart \| nil => [] \| cons h p => ⟨(u, _), h⟩ :: p.darts #align simple_graph.walk.darts SimpleGraph.Walk.darts def edges {u v : V} (p : G.Walk u v) : List (Sym2 V) := p.darts.map Dart.edge #align simple_graph.walk.edges SimpleGraph.Walk.edges @[simp] theorem support_nil {u : V} : (nil : G.Walk u u).support = [u] := rfl #align simple_graph.walk.support_nil SimpleGraph.Walk.support_nil @[simp] theorem support_cons {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).support = u :: p.support := rfl #align simple_graph.walk.support_cons SimpleGraph.Walk.support_cons @[simp] theorem support_concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : (p.concat h).support = p.support.concat w := by induction p <;> simp [, concat_nil] #align simple_graph.walk.support_concat SimpleGraph.Walk.support_concat @[simp] theorem support_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).support = p.support := by subst_vars rfl #align simple_graph.walk.support_copy SimpleGraph.Walk.support_copy theorem support_append {u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : (p.append p').support = p.support ++ p'.support.tail := by induction p <;> cases p' <;> simp [] #align simple_graph.walk.support_append SimpleGraph.Walk.support_append @[simp] theorem support_reverse {u v : V} (p : G.Walk u v) : p.reverse.support = p.support.reverse := by induction p <;> simp [support_append, ] #align simple_graph.walk.support_reverse SimpleGraph.Walk.support_reverse @[simp] theorem support_ne_nil {u v : V} (p : G.Walk u v) : p.support ≠ [] := by cases p <;> simp #align simple_graph.walk.support_ne_nil SimpleGraph.Walk.support_ne_nil theorem tail_support_append {u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : (p.append p').support.tail = p.support.tail ++ p'.support.tail := by rw [support_append, List.tail_append_of_ne_nil _ _ (support_ne_nil _)] #align simple_graph.walk.tail_support_append SimpleGraph.Walk.tail_support_append theorem support_eq_cons {u v : V} (p : G.Walk u v) : p.support = u :: p.support.tail := by cases p <;> simp #align simple_graph.walk.support_eq_cons SimpleGraph.Walk.support_eq_cons @[simp] theorem start_mem_support {u v : V} (p : G.Walk u v) : u ∈ p.support := by cases p <;> simp #align simple_graph.walk.start_mem_support SimpleGraph.Walk.start_mem_support @[simp] theorem end_mem_support {u v : V} (p : G.Walk u v) : v ∈ p.support := by induction p <;> simp [] #align simple_graph.walk.end_mem_support SimpleGraph.Walk.end_mem_support @[simp] theorem support_nonempty {u v : V} (p : G.Walk u v) : { w \| w ∈ p.support }.Nonempty := ⟨u, by simp⟩ #align simple_graph.walk.support_nonempty SimpleGraph.Walk.support_nonempty theorem mem_support_iff {u v w : V} (p : G.Walk u v) : w ∈ p.support ↔ w = u ∨ w ∈ p.support.tail := by cases p <;> simp #align simple_graph.walk.mem_support_iff SimpleGraph.Walk.mem_support_iff theorem mem_support_nil_iff {u v : V} : u ∈ (nil : G.Walk v v).support ↔ u = v := by simp #align simple_graph.walk.mem_support_nil_iff SimpleGraph.Walk.mem_support_nil_iff @[simp] theorem mem_tail_support_append_iff {t u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : t ∈ (p.append p').support.tail ↔ t ∈ p.support.tail ∨ t ∈ p'.support.tail := by rw [tail_support_append, List.mem_append] #align simple_graph.walk.mem_tail_support_append_iff SimpleGraph.Walk.mem_tail_support_append_iff @[simp] theorem end_mem_tail_support_of_ne {u v : V} (h : u ≠ v) (p : G.Walk u v) : v ∈ p.support.tail := by obtain ⟨_, _, _, rfl⟩ := exists_eq_cons_of_ne h p simp #align simple_graph.walk.end_mem_tail_support_of_ne SimpleGraph.Walk.end_mem_tail_support_of_ne @[simp, nolint unusedHavesSuffices] theorem mem_support_append_iff {t u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : t ∈ (p.append p').support ↔ t ∈ p.support ∨ t ∈ p'.support := by simp only [mem_support_iff, mem_tail_support_append_iff] obtain rfl \| h := eq_or_ne t v <;> obtain rfl \| h' := eq_or_ne t u <;> -- this `have` triggers the unusedHavesSuffices linter: (try have := h'.symm) <;> simp [] #align simple_graph.walk.mem_support_append_iff SimpleGraph.Walk.mem_support_append_iff @[simp] theorem subset_support_append_left {V : Type u} {G : SimpleGraph V} {u v w : V} (p : G.Walk u v) (q : G.Walk v w) : p.support ⊆ (p.append q).support := by simp only [Walk.support_append, List.subset_append_left] #align simple_graph.walk.subset_support_append_left SimpleGraph.Walk.subset_support_append_left @[simp] theorem subset_support_append_right {V : Type u} {G : SimpleGraph V} {u v w : V} (p : G.Walk u v) (q : G.Walk v w) : q.support ⊆ (p.append q).support := by intro h simp (config := { contextual := true }) only [mem_support_append_iff, or_true_iff, imp_true_iff] #align simple_graph.walk.subset_support_append_right SimpleGraph.Walk.subset_support_append_right theorem coe_support {u v : V} (p : G.Walk u v) : (p.support : Multiset V) = {u} + p.support.tail := by cases p <;> rfl #align simple_graph.walk.coe_support SimpleGraph.Walk.coe_support theorem coe_support_append {u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : ((p.append p').support : Multiset V) = {u} + p.support.tail + p'.support.tail := by rw [support_append, ← Multiset.coe_add, coe_support] #align simple_graph.walk.coe_support_append SimpleGraph.Walk.coe_support_append theorem coe_support_append' [DecidableEq V] {u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : ((p.append p').support : Multiset V) = p.support + p'.support - {v} := by rw [support_append, ← Multiset.coe_add] simp only [coe_support] rw [add_comm ({v} : Multiset V)] simp only [← add_assoc, add_tsub_cancel_right] #align simple_graph.walk.coe_support_append' SimpleGraph.Walk.coe_support_append' theorem chain_adj_support {u v w : V} (h : G.Adj u v) : ∀ (p : G.Walk v w), List.Chain G.Adj u p.support \| nil => List.Chain.cons h List.Chain.nil \| cons h' p => List.Chain.cons h (chain_adj_support h' p) #align simple_graph.walk.chain_adj_support SimpleGraph.Walk.chain_adj_support theorem chain'_adj_support {u v : V} : ∀ (p : G.Walk u v), List.Chain' G.Adj p.support \| nil => List.Chain.nil \| cons h p => chain_adj_support h p #align simple_graph.walk.chain'_adj_support SimpleGraph.Walk.chain'_adj_support theorem chain_dartAdj_darts {d : G.Dart} {v w : V} (h : d.snd = v) (p : G.Walk v w) : List.Chain G.DartAdj d p.darts := by induction p generalizing d with \| nil => exact List.Chain.nil -- Porting note: needed to defer `h` and `rfl` to help elaboration \| cons h' p ih => exact List.Chain.cons (by exact h) (ih (by rfl)) #align simple_graph.walk.chain_dart_adj_darts SimpleGraph.Walk.chain_dartAdj_darts theorem chain'_dartAdj_darts {u v : V} : ∀ (p : G.Walk u v), List.Chain' G.DartAdj p.darts \| nil => trivial -- Porting note: needed to defer `rfl` to help elaboration \| cons h p => chain_dartAdj_darts (by rfl) p #align simple_graph.walk.chain'_dart_adj_darts SimpleGraph.Walk.chain'_dartAdj_darts theorem edges_subset_edgeSet {u v : V} : ∀ (p : G.Walk u v) ⦃e : Sym2 V⦄, e ∈ p.edges → e ∈ G.edgeSet \| cons h' p', e, h => by cases h · exact h' next h' => exact edges_subset_edgeSet p' h' #align simple_graph.walk.edges_subset_edge_set SimpleGraph.Walk.edges_subset_edgeSet theorem adj_of_mem_edges {u v x y : V} (p : G.Walk u v) (h : s(x, y) ∈ p.edges) : G.Adj x y := edges_subset_edgeSet p h #align simple_graph.walk.adj_of_mem_edges SimpleGraph.Walk.adj_of_mem_edges @[simp] theorem darts_nil {u : V} : (nil : G.Walk u u).darts = [] := rfl #align simple_graph.walk.darts_nil SimpleGraph.Walk.darts_nil @[simp] theorem darts_cons {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).darts = ⟨(u, v), h⟩ :: p.darts := rfl #align simple_graph.walk.darts_cons SimpleGraph.Walk.darts_cons @[simp] theorem darts_concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : (p.concat h).darts = p.darts.concat ⟨(v, w), h⟩ := by induction p <;> simp [, concat_nil] #align simple_graph.walk.darts_concat SimpleGraph.Walk.darts_concat @[simp] theorem darts_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).darts = p.darts := by subst_vars rfl #align simple_graph.walk.darts_copy SimpleGraph.Walk.darts_copy @[simp] theorem darts_append {u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : (p.append p').darts = p.darts ++ p'.darts := by induction p <;> simp [] #align simple_graph.walk.darts_append SimpleGraph.Walk.darts_append @[simp] theorem darts_reverse {u v : V} (p : G.Walk u v) : p.reverse.darts = (p.darts.map Dart.symm).reverse := by induction p <;> simp [, Sym2.eq_swap] #align simple_graph.walk.darts_reverse SimpleGraph.Walk.darts_reverse theorem mem_darts_reverse {u v : V} {d : G.Dart} {p : G.Walk u v} : d ∈ p.reverse.darts ↔ d.symm ∈ p.darts := by simp #align simple_graph.walk.mem_darts_reverse SimpleGraph.Walk.mem_darts_reverse theorem cons_map_snd_darts {u v : V} (p : G.Walk u v) : (u :: p.darts.map (·.snd)) = p.support := by induction p <;> simp! [] #align simple_graph.walk.cons_map_snd_darts SimpleGraph.Walk.cons_map_snd_darts theorem map_snd_darts {u v : V} (p : G.Walk u v) : p.darts.map (·.snd) = p.support.tail := by simpa using congr_arg List.tail (cons_map_snd_darts p) #align simple_graph.walk.map_snd_darts SimpleGraph.Walk.map_snd_darts theorem map_fst_darts_append {u v : V} (p : G.Walk u v) : p.darts.map (·.fst) ++ [v] = p.support := by induction p <;> simp! [] #align simple_graph.walk.map_fst_darts_append SimpleGraph.Walk.map_fst_darts_append theorem map_fst_darts {u v : V} (p : G.Walk u v) : p.darts.map (·.fst) = p.support.dropLast := by simpa! using congr_arg List.dropLast (map_fst_darts_append p) #align simple_graph.walk.map_fst_darts SimpleGraph.Walk.map_fst_darts @[simp] theorem edges_nil {u : V} : (nil : G.Walk u u).edges = [] := rfl #align simple_graph.walk.edges_nil SimpleGraph.Walk.edges_nil @[simp] theorem edges_cons {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).edges = s(u, v) :: p.edges := rfl #align simple_graph.walk.edges_cons SimpleGraph.Walk.edges_cons @[simp] theorem edges_concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : (p.concat h).edges = p.edges.concat s(v, w) := by simp [edges] #align simple_graph.walk.edges_concat SimpleGraph.Walk.edges_concat @[simp] theorem edges_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).edges = p.edges := by subst_vars rfl #align simple_graph.walk.edges_copy SimpleGraph.Walk.edges_copy @[simp] theorem edges_append {u v w : V} (p : G.Walk u v) (p' : G.Walk v w) : (p.append p').edges = p.edges ++ p'.edges := by simp [edges] #align simple_graph.walk.edges_append SimpleGraph.Walk.edges_append @[simp] theorem edges_reverse {u v : V} (p : G.Walk u v) : p.reverse.edges = p.edges.reverse := by simp [edges, List.map_reverse] #align simple_graph.walk.edges_reverse SimpleGraph.Walk.edges_reverse @[simp] theorem length_support {u v : V} (p : G.Walk u v) : p.support.length = p.length + 1 := by induction p <;> simp [] #align simple_graph.walk.length_support SimpleGraph.Walk.length_support @[simp] theorem length_darts {u v : V} (p : G.Walk u v) : p.darts.length = p.length := by induction p <;> simp [] #align simple_graph.walk.length_darts SimpleGraph.Walk.length_darts @[simp] theorem length_edges {u v : V} (p : G.Walk u v) : p.edges.length = p.length := by simp [edges] #align simple_graph.walk.length_edges SimpleGraph.Walk.length_edges theorem dart_fst_mem_support_of_mem_darts {u v : V} : ∀ (p : G.Walk u v) {d : G.Dart}, d ∈ p.darts → d.fst ∈ p.support \| cons h p', d, hd => by simp only [support_cons, darts_cons, List.mem_cons] at hd ⊢ rcases hd with (rfl \| hd) · exact Or.inl rfl · exact Or.inr (dart_fst_mem_support_of_mem_darts _ hd) #align simple_graph.walk.dart_fst_mem_support_of_mem_darts SimpleGraph.Walk.dart_fst_mem_support_of_mem_darts theorem dart_snd_mem_support_of_mem_darts {u v : V} (p : G.Walk u v) {d : G.Dart} (h : d ∈ p.darts) : d.snd ∈ p.support := by simpa using p.reverse.dart_fst_mem_support_of_mem_darts (by simp [h] : d.symm ∈ p.reverse.darts) #align simple_graph.walk.dart_snd_mem_support_of_mem_darts SimpleGraph.Walk.dart_snd_mem_support_of_mem_darts theorem fst_mem_support_of_mem_edges {t u v w : V} (p : G.Walk v w) (he : s(t, u) ∈ p.edges) : t ∈ p.support := by obtain ⟨d, hd, he⟩ := List.mem_map.mp he rw [dart_edge_eq_mk'_iff'] at he rcases he with (⟨rfl, rfl⟩ \| ⟨rfl, rfl⟩) · exact dart_fst_mem_support_of_mem_darts _ hd · exact dart_snd_mem_support_of_mem_darts _ hd #align simple_graph.walk.fst_mem_support_of_mem_edges SimpleGraph.Walk.fst_mem_support_of_mem_edges theorem snd_mem_support_of_mem_edges {t u v w : V} (p : G.Walk v w) (he : s(t, u) ∈ p.edges) : u ∈ p.support := by rw [Sym2.eq_swap] at he exact p.fst_mem_support_of_mem_edges he #align simple_graph.walk.snd_mem_support_of_mem_edges SimpleGraph.Walk.snd_mem_support_of_mem_edges theorem darts_nodup_of_support_nodup {u v : V} {p : G.Walk u v} (h : p.support.Nodup) : p.darts.Nodup := by induction p with \| nil => simp \| cons _ p' ih => simp only [darts_cons, support_cons, List.nodup_cons] at h ⊢ exact ⟨fun h' => h.1 (dart_fst_mem_support_of_mem_darts p' h'), ih h.2⟩ #align simple_graph.walk.darts_nodup_of_support_nodup SimpleGraph.Walk.darts_nodup_of_support_nodup theorem edges_nodup_of_support_nodup {u v : V} {p : G.Walk u v} (h : p.support.Nodup) : p.edges.Nodup := by induction p with \| nil => simp \| cons _ p' ih => simp only [edges_cons, support_cons, List.nodup_cons] at h ⊢ exact ⟨fun h' => h.1 (fst_mem_support_of_mem_edges p' h'), ih h.2⟩ #align simple_graph.walk.edges_nodup_of_support_nodup SimpleGraph.Walk.edges_nodup_of_support_nodup inductive Nil : {v w : V} → G.Walk v w → Prop \| nil {u : V} : Nil (nil : G.Walk u u) variable {u v w : V} @[simp] lemma nil_nil : (nil : G.Walk u u).Nil := Nil.nil @[simp] lemma not_nil_cons {h : G.Adj u v} {p : G.Walk v w} : ¬ (cons h p).Nil := nofun instance (p : G.Walk v w) : Decidable p.Nil := match p with \| nil => isTrue .nil \| cons _ _ => isFalse nofun protected lemma Nil.eq {p : G.Walk v w} : p.Nil → v = w \| .nil => rfl lemma not_nil_of_ne {p : G.Walk v w} : v ≠ w → ¬ p.Nil := mt Nil.eq lemma nil_iff_support_eq {p : G.Walk v w} : p.Nil ↔ p.support = [v] := by cases p <;> simp lemma nil_iff_length_eq {p : G.Walk v w} : p.Nil ↔ p.length = 0 := by cases p <;> simp lemma not_nil_iff {p : G.Walk v w} : ¬ p.Nil ↔ ∃ (u : V) (h : G.Adj v u) (q : G.Walk u w), p = cons h q := by cases p <;> simp [] lemma nil_iff_eq_nil : ∀ {p : G.Walk v v}, p.Nil ↔ p = nil \| .nil \| .cons _ _ => by simp alias ⟨Nil.eq_nil, _⟩ := nil_iff_eq_nil @[elab_as_elim] def notNilRec {motive : {u w : V} → (p : G.Walk u w) → (h : ¬ p.Nil) → Sort} (cons : {u v w : V} → (h : G.Adj u v) → (q : G.Walk v w) → motive (cons h q) not_nil_cons) (p : G.Walk u w) : (hp : ¬ p.Nil) → motive p hp := match p with \| nil => fun hp => absurd .nil hp \| .cons h q => fun _ => cons h q def sndOfNotNil (p : G.Walk v w) (hp : ¬ p.Nil) : V := p.notNilRec (@fun _ u _ _ _ => u) hp @[simp] lemma adj_sndOfNotNil {p : G.Walk v w} (hp : ¬ p.Nil) : G.Adj v (p.sndOfNotNil hp) := p.notNilRec (fun h _ => h) hp def tail (p : G.Walk u v) (hp : ¬ p.Nil) : G.Walk (p.sndOfNotNil hp) v := p.notNilRec (fun _ q => q) hp @[simps] def firstDart (p : G.Walk v w) (hp : ¬ p.Nil) : G.Dart where fst := v snd := p.sndOfNotNil hp adj := p.adj_sndOfNotNil hp lemma edge_firstDart (p : G.Walk v w) (hp : ¬ p.Nil) : (p.firstDart hp).edge = s(v, p.sndOfNotNil hp) := rfl variable {x y : V} -- TODO: rename to u, v, w instead? @[simp] lemma cons_tail_eq (p : G.Walk x y) (hp : ¬ p.Nil) : cons (p.adj_sndOfNotNil hp) (p.tail hp) = p := p.notNilRec (fun _ _ => rfl) hp @[simp] lemma cons_support_tail (p : G.Walk x y) (hp : ¬p.Nil) : x :: (p.tail hp).support = p.support := by rw [← support_cons, cons_tail_eq] @[simp] lemma length_tail_add_one {p : G.Walk x y} (hp : ¬ p.Nil) : (p.tail hp).length + 1 = p.length := by rw [← length_cons, cons_tail_eq] @[simp] lemma nil_copy {x' y' : V} {p : G.Walk x y} (hx : x = x') (hy : y = y') : (p.copy hx hy).Nil = p.Nil := by subst_vars; rfl @[simp] lemma support_tail (p : G.Walk v v) (hp) : (p.tail hp).support = p.support.tail := by rw [← cons_support_tail p hp, List.tail_cons] @[mk_iff isTrail_def] structure IsTrail {u v : V} (p : G.Walk u v) : Prop where edges_nodup : p.edges.Nodup #align simple_graph.walk.is_trail SimpleGraph.Walk.IsTrail #align simple_graph.walk.is_trail_def SimpleGraph.Walk.isTrail_def structure IsPath {u v : V} (p : G.Walk u v) extends IsTrail p : Prop where support_nodup : p.support.Nodup #align simple_graph.walk.is_path SimpleGraph.Walk.IsPath -- Porting note: used to use `extends to_trail : is_trail p` in structure protected lemma IsPath.isTrail {p : Walk G u v}(h : IsPath p) : IsTrail p := h.toIsTrail #align simple_graph.walk.is_path.to_trail SimpleGraph.Walk.IsPath.isTrail @[mk_iff isCircuit_def] structure IsCircuit {u : V} (p : G.Walk u u) extends IsTrail p : Prop where ne_nil : p ≠ nil #align simple_graph.walk.is_circuit SimpleGraph.Walk.IsCircuit #align simple_graph.walk.is_circuit_def SimpleGraph.Walk.isCircuit_def -- Porting note: used to use `extends to_trail : is_trail p` in structure protected lemma IsCircuit.isTrail {p : Walk G u u} (h : IsCircuit p) : IsTrail p := h.toIsTrail #align simple_graph.walk.is_circuit.to_trail SimpleGraph.Walk.IsCircuit.isTrail structure IsCycle {u : V} (p : G.Walk u u) extends IsCircuit p : Prop where support_nodup : p.support.tail.Nodup #align simple_graph.walk.is_cycle SimpleGraph.Walk.IsCycle -- Porting note: used to use `extends to_circuit : is_circuit p` in structure protected lemma IsCycle.isCircuit {p : Walk G u u} (h : IsCycle p) : IsCircuit p := h.toIsCircuit #align simple_graph.walk.is_cycle.to_circuit SimpleGraph.Walk.IsCycle.isCircuit @[simp] theorem isTrail_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).IsTrail ↔ p.IsTrail := by subst_vars rfl #align simple_graph.walk.is_trail_copy SimpleGraph.Walk.isTrail_copy theorem IsPath.mk' {u v : V} {p : G.Walk u v} (h : p.support.Nodup) : p.IsPath := ⟨⟨edges_nodup_of_support_nodup h⟩, h⟩ #align simple_graph.walk.is_path.mk' SimpleGraph.Walk.IsPath.mk' theorem isPath_def {u v : V} (p : G.Walk u v) : p.IsPath ↔ p.support.Nodup := ⟨IsPath.support_nodup, IsPath.mk'⟩ #align simple_graph.walk.is_path_def SimpleGraph.Walk.isPath_def @[simp] theorem isPath_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).IsPath ↔ p.IsPath := by subst_vars rfl #align simple_graph.walk.is_path_copy SimpleGraph.Walk.isPath_copy @[simp] theorem isCircuit_copy {u u'} (p : G.Walk u u) (hu : u = u') : (p.copy hu hu).IsCircuit ↔ p.IsCircuit := by subst_vars rfl #align simple_graph.walk.is_circuit_copy SimpleGraph.Walk.isCircuit_copy lemma IsCircuit.not_nil {p : G.Walk v v} (hp : IsCircuit p) : ¬ p.Nil := (hp.ne_nil ·.eq_nil) theorem isCycle_def {u : V} (p : G.Walk u u) : p.IsCycle ↔ p.IsTrail ∧ p ≠ nil ∧ p.support.tail.Nodup := Iff.intro (fun h => ⟨h.1.1, h.1.2, h.2⟩) fun h => ⟨⟨h.1, h.2.1⟩, h.2.2⟩ #align simple_graph.walk.is_cycle_def SimpleGraph.Walk.isCycle_def @[simp] theorem isCycle_copy {u u'} (p : G.Walk u u) (hu : u = u') : (p.copy hu hu).IsCycle ↔ p.IsCycle := by subst_vars rfl #align simple_graph.walk.is_cycle_copy SimpleGraph.Walk.isCycle_copy lemma IsCycle.not_nil {p : G.Walk v v} (hp : IsCycle p) : ¬ p.Nil := (hp.ne_nil ·.eq_nil) @[simp] theorem IsTrail.nil {u : V} : (nil : G.Walk u u).IsTrail := ⟨by simp [edges]⟩ #align simple_graph.walk.is_trail.nil SimpleGraph.Walk.IsTrail.nil theorem IsTrail.of_cons {u v w : V} {h : G.Adj u v} {p : G.Walk v w} : (cons h p).IsTrail → p.IsTrail := by simp [isTrail_def] #align simple_graph.walk.is_trail.of_cons SimpleGraph.Walk.IsTrail.of_cons @[simp] theorem cons_isTrail_iff {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).IsTrail ↔ p.IsTrail ∧ s(u, v) ∉ p.edges := by simp [isTrail_def, and_comm] #align simple_graph.walk.cons_is_trail_iff SimpleGraph.Walk.cons_isTrail_iff theorem IsTrail.reverse {u v : V} (p : G.Walk u v) (h : p.IsTrail) : p.reverse.IsTrail := by simpa [isTrail_def] using h #align simple_graph.walk.is_trail.reverse SimpleGraph.Walk.IsTrail.reverse @[simp] theorem reverse_isTrail_iff {u v : V} (p : G.Walk u v) : p.reverse.IsTrail ↔ p.IsTrail := by constructor <;> · intro h convert h.reverse _ try rw [reverse_reverse] #align simple_graph.walk.reverse_is_trail_iff SimpleGraph.Walk.reverse_isTrail_iff theorem IsTrail.of_append_left {u v w : V} {p : G.Walk u v} {q : G.Walk v w} (h : (p.append q).IsTrail) : p.IsTrail := by rw [isTrail_def, edges_append, List.nodup_append] at h exact ⟨h.1⟩ #align simple_graph.walk.is_trail.of_append_left SimpleGraph.Walk.IsTrail.of_append_left theorem IsTrail.of_append_right {u v w : V} {p : G.Walk u v} {q : G.Walk v w} (h : (p.append q).IsTrail) : q.IsTrail := by rw [isTrail_def, edges_append, List.nodup_append] at h exact ⟨h.2.1⟩ #align simple_graph.walk.is_trail.of_append_right SimpleGraph.Walk.IsTrail.of_append_right theorem IsTrail.count_edges_le_one [DecidableEq V] {u v : V} {p : G.Walk u v} (h : p.IsTrail) (e : Sym2 V) : p.edges.count e ≤ 1 := List.nodup_iff_count_le_one.mp h.edges_nodup e #align simple_graph.walk.is_trail.count_edges_le_one SimpleGraph.Walk.IsTrail.count_edges_le_one theorem IsTrail.count_edges_eq_one [DecidableEq V] {u v : V} {p : G.Walk u v} (h : p.IsTrail) {e : Sym2 V} (he : e ∈ p.edges) : p.edges.count e = 1 := List.count_eq_one_of_mem h.edges_nodup he #align simple_graph.walk.is_trail.count_edges_eq_one SimpleGraph.Walk.IsTrail.count_edges_eq_one theorem IsPath.nil {u : V} : (nil : G.Walk u u).IsPath := by constructor <;> simp #align simple_graph.walk.is_path.nil SimpleGraph.Walk.IsPath.nil theorem IsPath.of_cons {u v w : V} {h : G.Adj u v} {p : G.Walk v w} : (cons h p).IsPath → p.IsPath := by simp [isPath_def] #align simple_graph.walk.is_path.of_cons SimpleGraph.Walk.IsPath.of_cons @[simp] theorem cons_isPath_iff {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).IsPath ↔ p.IsPath ∧ u ∉ p.support := by constructor <;> simp (config := { contextual := true }) [isPath_def] #align simple_graph.walk.cons_is_path_iff SimpleGraph.Walk.cons_isPath_iff protected lemma IsPath.cons {p : Walk G v w} (hp : p.IsPath) (hu : u ∉ p.support) {h : G.Adj u v} : (cons h p).IsPath := (cons_isPath_iff _ _).2 ⟨hp, hu⟩ @[simp] theorem isPath_iff_eq_nil {u : V} (p : G.Walk u u) : p.IsPath ↔ p = nil := by cases p <;> simp [IsPath.nil] #align simple_graph.walk.is_path_iff_eq_nil SimpleGraph.Walk.isPath_iff_eq_nil	Mathlib/Combinatorics/SimpleGraph/Connectivity.lean	1,093	1,094	theorem IsPath.reverse {u v : V} {p : G.Walk u v} (h : p.IsPath) : p.reverse.IsPath := by	simpa [isPath_def] using h
import Mathlib.Probability.Kernel.Disintegration.Unique import Mathlib.Probability.Notation #align_import probability.kernel.cond_distrib from "leanprover-community/mathlib"@"00abe0695d8767201e6d008afa22393978bb324d" open MeasureTheory Set Filter TopologicalSpace open scoped ENNReal MeasureTheory ProbabilityTheory namespace ProbabilityTheory variable {α β Ω F : Type} [MeasurableSpace Ω] [StandardBorelSpace Ω] [Nonempty Ω] [NormedAddCommGroup F] {mα : MeasurableSpace α} {μ : Measure α} [IsFiniteMeasure μ] {X : α → β} {Y : α → Ω} noncomputable irreducible_def condDistrib {_ : MeasurableSpace α} [MeasurableSpace β] (Y : α → Ω) (X : α → β) (μ : Measure α) [IsFiniteMeasure μ] : kernel β Ω := (μ.map fun a => (X a, Y a)).condKernel #align probability_theory.cond_distrib ProbabilityTheory.condDistrib instance [MeasurableSpace β] : IsMarkovKernel (condDistrib Y X μ) := by rw [condDistrib]; infer_instance variable {mβ : MeasurableSpace β} {s : Set Ω} {t : Set β} {f : β × Ω → F} lemma condDistrib_apply_of_ne_zero [MeasurableSingletonClass β] (hY : Measurable Y) (x : β) (hX : μ.map X {x} ≠ 0) (s : Set Ω) : condDistrib Y X μ x s = (μ.map X {x})⁻¹ μ.map (fun a => (X a, Y a)) ({x} ×ˢ s) := by rw [condDistrib, Measure.condKernel_apply_of_ne_zero _ s] · rw [Measure.fst_map_prod_mk hY] · rwa [Measure.fst_map_prod_mk hY] theorem condDistrib_ae_eq_of_measure_eq_compProd (hX : Measurable X) (hY : Measurable Y) (κ : kernel β Ω) [IsFiniteKernel κ] (hκ : μ.map (fun x => (X x, Y x)) = μ.map X ⊗ₘ κ) : ∀ᵐ x ∂μ.map X, κ x = condDistrib Y X μ x := by have heq : μ.map X = (μ.map (fun x ↦ (X x, Y x))).fst := by ext s hs rw [Measure.map_apply hX hs, Measure.fst_apply hs, Measure.map_apply] exacts [rfl, Measurable.prod hX hY, measurable_fst hs] rw [heq, condDistrib] refine eq_condKernel_of_measure_eq_compProd _ ?_ convert hκ exact heq.symm section Integrability theorem integrable_toReal_condDistrib (hX : AEMeasurable X μ) (hs : MeasurableSet s) : Integrable (fun a => (condDistrib Y X μ (X a) s).toReal) μ := by refine integrable_toReal_of_lintegral_ne_top ?_ ?_ · exact Measurable.comp_aemeasurable (kernel.measurable_coe _ hs) hX · refine ne_of_lt ?_ calc ∫⁻ a, condDistrib Y X μ (X a) s ∂μ ≤ ∫⁻ _, 1 ∂μ := lintegral_mono fun a => prob_le_one _ = μ univ := lintegral_one _ < ∞ := measure_lt_top _ _ #align probability_theory.integrable_to_real_cond_distrib ProbabilityTheory.integrable_toReal_condDistrib theorem _root_.MeasureTheory.Integrable.condDistrib_ae_map (hY : AEMeasurable Y μ) (hf_int : Integrable f (μ.map fun a => (X a, Y a))) : ∀ᵐ b ∂μ.map X, Integrable (fun ω => f (b, ω)) (condDistrib Y X μ b) := by rw [condDistrib, ← Measure.fst_map_prod_mk₀ (X := X) hY]; exact hf_int.condKernel_ae #align measure_theory.integrable.cond_distrib_ae_map MeasureTheory.Integrable.condDistrib_ae_map theorem _root_.MeasureTheory.Integrable.condDistrib_ae (hX : AEMeasurable X μ) (hY : AEMeasurable Y μ) (hf_int : Integrable f (μ.map fun a => (X a, Y a))) : ∀ᵐ a ∂μ, Integrable (fun ω => f (X a, ω)) (condDistrib Y X μ (X a)) := ae_of_ae_map hX (hf_int.condDistrib_ae_map hY) #align measure_theory.integrable.cond_distrib_ae MeasureTheory.Integrable.condDistrib_ae	Mathlib/Probability/Kernel/CondDistrib.lean	157	160	theorem _root_.MeasureTheory.Integrable.integral_norm_condDistrib_map (hY : AEMeasurable Y μ) (hf_int : Integrable f (μ.map fun a => (X a, Y a))) : Integrable (fun x => ∫ y, ‖f (x, y)‖ ∂condDistrib Y X μ x) (μ.map X) := by	rw [condDistrib, ← Measure.fst_map_prod_mk₀ (X := X) hY]; exact hf_int.integral_norm_condKernel
import Mathlib.Data.Finsupp.Multiset import Mathlib.Data.Nat.GCD.BigOperators import Mathlib.Data.Nat.PrimeFin import Mathlib.NumberTheory.Padics.PadicVal import Mathlib.Order.Interval.Finset.Nat #align_import data.nat.factorization.basic from "leanprover-community/mathlib"@"f694c7dead66f5d4c80f446c796a5aad14707f0e" -- Workaround for lean4#2038 attribute [-instance] instBEqNat open Nat Finset List Finsupp namespace Nat variable {a b m n p : ℕ} def factorization (n : ℕ) : ℕ →₀ ℕ where support := n.primeFactors toFun p := if p.Prime then padicValNat p n else 0 mem_support_toFun := by simp [not_or]; aesop #align nat.factorization Nat.factorization @[simp] lemma support_factorization (n : ℕ) : (factorization n).support = n.primeFactors := rfl theorem factorization_def (n : ℕ) {p : ℕ} (pp : p.Prime) : n.factorization p = padicValNat p n := by simpa [factorization] using absurd pp #align nat.factorization_def Nat.factorization_def @[simp] theorem factors_count_eq {n p : ℕ} : n.factors.count p = n.factorization p := by rcases n.eq_zero_or_pos with (rfl \| hn0) · simp [factorization, count] if pp : p.Prime then ?_ else rw [count_eq_zero_of_not_mem (mt prime_of_mem_factors pp)] simp [factorization, pp] simp only [factorization_def _ pp] apply _root_.le_antisymm · rw [le_padicValNat_iff_replicate_subperm_factors pp hn0.ne'] exact List.le_count_iff_replicate_sublist.mp le_rfl \|>.subperm · rw [← lt_add_one_iff, lt_iff_not_ge, ge_iff_le, le_padicValNat_iff_replicate_subperm_factors pp hn0.ne'] intro h have := h.count_le p simp at this #align nat.factors_count_eq Nat.factors_count_eq theorem factorization_eq_factors_multiset (n : ℕ) : n.factorization = Multiset.toFinsupp (n.factors : Multiset ℕ) := by ext p simp #align nat.factorization_eq_factors_multiset Nat.factorization_eq_factors_multiset theorem multiplicity_eq_factorization {n p : ℕ} (pp : p.Prime) (hn : n ≠ 0) : multiplicity p n = n.factorization p := by simp [factorization, pp, padicValNat_def' pp.ne_one hn.bot_lt] #align nat.multiplicity_eq_factorization Nat.multiplicity_eq_factorization @[simp] theorem factorization_prod_pow_eq_self {n : ℕ} (hn : n ≠ 0) : n.factorization.prod (· ^ ·) = n := by rw [factorization_eq_factors_multiset n] simp only [← prod_toMultiset, factorization, Multiset.prod_coe, Multiset.toFinsupp_toMultiset] exact prod_factors hn #align nat.factorization_prod_pow_eq_self Nat.factorization_prod_pow_eq_self theorem eq_of_factorization_eq {a b : ℕ} (ha : a ≠ 0) (hb : b ≠ 0) (h : ∀ p : ℕ, a.factorization p = b.factorization p) : a = b := eq_of_perm_factors ha hb (by simpa only [List.perm_iff_count, factors_count_eq] using h) #align nat.eq_of_factorization_eq Nat.eq_of_factorization_eq theorem factorization_inj : Set.InjOn factorization { x : ℕ \| x ≠ 0 } := fun a ha b hb h => eq_of_factorization_eq ha hb fun p => by simp [h] #align nat.factorization_inj Nat.factorization_inj @[simp] theorem factorization_zero : factorization 0 = 0 := by ext; simp [factorization] #align nat.factorization_zero Nat.factorization_zero @[simp] theorem factorization_one : factorization 1 = 0 := by ext; simp [factorization] #align nat.factorization_one Nat.factorization_one #noalign nat.support_factorization #align nat.factor_iff_mem_factorization Nat.mem_primeFactors_iff_mem_factors #align nat.prime_of_mem_factorization Nat.prime_of_mem_primeFactors #align nat.pos_of_mem_factorization Nat.pos_of_mem_primeFactors #align nat.le_of_mem_factorization Nat.le_of_mem_primeFactors theorem factorization_eq_zero_iff (n p : ℕ) : n.factorization p = 0 ↔ ¬p.Prime ∨ ¬p ∣ n ∨ n = 0 := by simp_rw [← not_mem_support_iff, support_factorization, mem_primeFactors, not_and_or, not_ne_iff] #align nat.factorization_eq_zero_iff Nat.factorization_eq_zero_iff @[simp] theorem factorization_eq_zero_of_non_prime (n : ℕ) {p : ℕ} (hp : ¬p.Prime) : n.factorization p = 0 := by simp [factorization_eq_zero_iff, hp] #align nat.factorization_eq_zero_of_non_prime Nat.factorization_eq_zero_of_non_prime theorem factorization_eq_zero_of_not_dvd {n p : ℕ} (h : ¬p ∣ n) : n.factorization p = 0 := by simp [factorization_eq_zero_iff, h] #align nat.factorization_eq_zero_of_not_dvd Nat.factorization_eq_zero_of_not_dvd theorem factorization_eq_zero_of_lt {n p : ℕ} (h : n < p) : n.factorization p = 0 := Finsupp.not_mem_support_iff.mp (mt le_of_mem_primeFactors (not_le_of_lt h)) #align nat.factorization_eq_zero_of_lt Nat.factorization_eq_zero_of_lt @[simp] theorem factorization_zero_right (n : ℕ) : n.factorization 0 = 0 := factorization_eq_zero_of_non_prime _ not_prime_zero #align nat.factorization_zero_right Nat.factorization_zero_right @[simp] theorem factorization_one_right (n : ℕ) : n.factorization 1 = 0 := factorization_eq_zero_of_non_prime _ not_prime_one #align nat.factorization_one_right Nat.factorization_one_right theorem dvd_of_factorization_pos {n p : ℕ} (hn : n.factorization p ≠ 0) : p ∣ n := dvd_of_mem_factors <\| mem_primeFactors_iff_mem_factors.1 <\| mem_support_iff.2 hn #align nat.dvd_of_factorization_pos Nat.dvd_of_factorization_pos theorem Prime.factorization_pos_of_dvd {n p : ℕ} (hp : p.Prime) (hn : n ≠ 0) (h : p ∣ n) : 0 < n.factorization p := by rwa [← factors_count_eq, count_pos_iff_mem, mem_factors_iff_dvd hn hp] #align nat.prime.factorization_pos_of_dvd Nat.Prime.factorization_pos_of_dvd theorem factorization_eq_zero_of_remainder {p r : ℕ} (i : ℕ) (hr : ¬p ∣ r) : (p * i + r).factorization p = 0 := by apply factorization_eq_zero_of_not_dvd rwa [← Nat.dvd_add_iff_right (Dvd.intro i rfl)] #align nat.factorization_eq_zero_of_remainder Nat.factorization_eq_zero_of_remainder theorem factorization_eq_zero_iff_remainder {p r : ℕ} (i : ℕ) (pp : p.Prime) (hr0 : r ≠ 0) : ¬p ∣ r ↔ (p * i + r).factorization p = 0 := by refine ⟨factorization_eq_zero_of_remainder i, fun h => ?_⟩ rw [factorization_eq_zero_iff] at h contrapose! h refine ⟨pp, ?_, ?_⟩ · rwa [← Nat.dvd_add_iff_right (dvd_mul_right p i)] · contrapose! hr0 exact (add_eq_zero_iff.mp hr0).2 #align nat.factorization_eq_zero_iff_remainder Nat.factorization_eq_zero_iff_remainder theorem factorization_eq_zero_iff' (n : ℕ) : n.factorization = 0 ↔ n = 0 ∨ n = 1 := by rw [factorization_eq_factors_multiset n] simp [factorization, AddEquiv.map_eq_zero_iff, Multiset.coe_eq_zero] #align nat.factorization_eq_zero_iff' Nat.factorization_eq_zero_iff' @[simp] theorem factorization_mul {a b : ℕ} (ha : a ≠ 0) (hb : b ≠ 0) : (a * b).factorization = a.factorization + b.factorization := by ext p simp only [add_apply, ← factors_count_eq, perm_iff_count.mp (perm_factors_mul ha hb) p, count_append] #align nat.factorization_mul Nat.factorization_mul #align nat.factorization_mul_support Nat.primeFactors_mul lemma prod_factorization_eq_prod_primeFactors {β : Type} [CommMonoid β] (f : ℕ → ℕ → β) : n.factorization.prod f = ∏ p ∈ n.primeFactors, f p (n.factorization p) := rfl #align nat.prod_factorization_eq_prod_factors Nat.prod_factorization_eq_prod_primeFactors lemma prod_primeFactors_prod_factorization {β : Type} [CommMonoid β] (f : ℕ → β) : ∏ p ∈ n.primeFactors, f p = n.factorization.prod (fun p _ ↦ f p) := rfl theorem factorization_prod {α : Type} {S : Finset α} {g : α → ℕ} (hS : ∀ x ∈ S, g x ≠ 0) : (S.prod g).factorization = S.sum fun x => (g x).factorization := by classical ext p refine Finset.induction_on' S ?_ ?_ · simp · intro x T hxS hTS hxT IH have hT : T.prod g ≠ 0 := prod_ne_zero_iff.mpr fun x hx => hS x (hTS hx) simp [prod_insert hxT, sum_insert hxT, ← IH, factorization_mul (hS x hxS) hT] #align nat.factorization_prod Nat.factorization_prod @[simp] theorem factorization_pow (n k : ℕ) : factorization (n ^ k) = k • n.factorization := by induction' k with k ih; · simp rcases eq_or_ne n 0 with (rfl \| hn) · simp rw [Nat.pow_succ, mul_comm, factorization_mul hn (pow_ne_zero _ hn), ih, add_smul, one_smul, add_comm] #align nat.factorization_pow Nat.factorization_pow @[simp] protected theorem Prime.factorization {p : ℕ} (hp : Prime p) : p.factorization = single p 1 := by ext q rw [← factors_count_eq, factors_prime hp, single_apply, count_singleton', if_congr eq_comm] <;> rfl #align nat.prime.factorization Nat.Prime.factorization @[simp] theorem Prime.factorization_self {p : ℕ} (hp : Prime p) : p.factorization p = 1 := by simp [hp] #align nat.prime.factorization_self Nat.Prime.factorization_self theorem Prime.factorization_pow {p k : ℕ} (hp : Prime p) : (p ^ k).factorization = single p k := by simp [hp] #align nat.prime.factorization_pow Nat.Prime.factorization_pow theorem eq_pow_of_factorization_eq_single {n p k : ℕ} (hn : n ≠ 0) (h : n.factorization = Finsupp.single p k) : n = p ^ k := by -- Porting note: explicitly added `Finsupp.prod_single_index` rw [← Nat.factorization_prod_pow_eq_self hn, h, Finsupp.prod_single_index] simp #align nat.eq_pow_of_factorization_eq_single Nat.eq_pow_of_factorization_eq_single theorem Prime.eq_of_factorization_pos {p q : ℕ} (hp : Prime p) (h : p.factorization q ≠ 0) : p = q := by simpa [hp.factorization, single_apply] using h #align nat.prime.eq_of_factorization_pos Nat.Prime.eq_of_factorization_pos theorem prod_pow_factorization_eq_self {f : ℕ →₀ ℕ} (hf : ∀ p : ℕ, p ∈ f.support → Prime p) : (f.prod (· ^ ·)).factorization = f := by have h : ∀ x : ℕ, x ∈ f.support → x ^ f x ≠ 0 := fun p hp => pow_ne_zero _ (Prime.ne_zero (hf p hp)) simp only [Finsupp.prod, factorization_prod h] conv => rhs rw [(sum_single f).symm] exact sum_congr rfl fun p hp => Prime.factorization_pow (hf p hp) #align nat.prod_pow_factorization_eq_self Nat.prod_pow_factorization_eq_self theorem eq_factorization_iff {n : ℕ} {f : ℕ →₀ ℕ} (hn : n ≠ 0) (hf : ∀ p ∈ f.support, Prime p) : f = n.factorization ↔ f.prod (· ^ ·) = n := ⟨fun h => by rw [h, factorization_prod_pow_eq_self hn], fun h => by rw [← h, prod_pow_factorization_eq_self hf]⟩ #align nat.eq_factorization_iff Nat.eq_factorization_iff def factorizationEquiv : ℕ+ ≃ { f : ℕ →₀ ℕ \| ∀ p ∈ f.support, Prime p } where toFun := fun ⟨n, _⟩ => ⟨n.factorization, fun _ => prime_of_mem_primeFactors⟩ invFun := fun ⟨f, hf⟩ => ⟨f.prod _, prod_pow_pos_of_zero_not_mem_support fun H => not_prime_zero (hf 0 H)⟩ left_inv := fun ⟨_, hx⟩ => Subtype.ext <\| factorization_prod_pow_eq_self hx.ne.symm right_inv := fun ⟨_, hf⟩ => Subtype.ext <\| prod_pow_factorization_eq_self hf #align nat.factorization_equiv Nat.factorizationEquiv theorem factorizationEquiv_apply (n : ℕ+) : (factorizationEquiv n).1 = n.1.factorization := by cases n rfl #align nat.factorization_equiv_apply Nat.factorizationEquiv_apply theorem factorizationEquiv_inv_apply {f : ℕ →₀ ℕ} (hf : ∀ p ∈ f.support, Prime p) : (factorizationEquiv.symm ⟨f, hf⟩).1 = f.prod (· ^ ·) := rfl #align nat.factorization_equiv_inv_apply Nat.factorizationEquiv_inv_apply -- Porting note: Lean 4 thinks we need `HPow` without this set_option quotPrecheck false in notation "ord_proj[" p "] " n:arg => p ^ Nat.factorization n p notation "ord_compl[" p "] " n:arg => n / ord_proj[p] n @[simp] theorem ord_proj_of_not_prime (n p : ℕ) (hp : ¬p.Prime) : ord_proj[p] n = 1 := by simp [factorization_eq_zero_of_non_prime n hp] #align nat.ord_proj_of_not_prime Nat.ord_proj_of_not_prime @[simp] theorem ord_compl_of_not_prime (n p : ℕ) (hp : ¬p.Prime) : ord_compl[p] n = n := by simp [factorization_eq_zero_of_non_prime n hp] #align nat.ord_compl_of_not_prime Nat.ord_compl_of_not_prime theorem ord_proj_dvd (n p : ℕ) : ord_proj[p] n ∣ n := by if hp : p.Prime then ?_ else simp [hp] rw [← factors_count_eq] apply dvd_of_factors_subperm (pow_ne_zero _ hp.ne_zero) rw [hp.factors_pow, List.subperm_ext_iff] intro q hq simp [List.eq_of_mem_replicate hq] #align nat.ord_proj_dvd Nat.ord_proj_dvd theorem ord_compl_dvd (n p : ℕ) : ord_compl[p] n ∣ n := div_dvd_of_dvd (ord_proj_dvd n p) #align nat.ord_compl_dvd Nat.ord_compl_dvd theorem ord_proj_pos (n p : ℕ) : 0 < ord_proj[p] n := by if pp : p.Prime then simp [pow_pos pp.pos] else simp [pp] #align nat.ord_proj_pos Nat.ord_proj_pos theorem ord_proj_le {n : ℕ} (p : ℕ) (hn : n ≠ 0) : ord_proj[p] n ≤ n := le_of_dvd hn.bot_lt (Nat.ord_proj_dvd n p) #align nat.ord_proj_le Nat.ord_proj_le theorem ord_compl_pos {n : ℕ} (p : ℕ) (hn : n ≠ 0) : 0 < ord_compl[p] n := by if pp : p.Prime then exact Nat.div_pos (ord_proj_le p hn) (ord_proj_pos n p) else simpa [Nat.factorization_eq_zero_of_non_prime n pp] using hn.bot_lt #align nat.ord_compl_pos Nat.ord_compl_pos theorem ord_compl_le (n p : ℕ) : ord_compl[p] n ≤ n := Nat.div_le_self _ _ #align nat.ord_compl_le Nat.ord_compl_le theorem ord_proj_mul_ord_compl_eq_self (n p : ℕ) : ord_proj[p] n ord_compl[p] n = n := Nat.mul_div_cancel' (ord_proj_dvd n p) #align nat.ord_proj_mul_ord_compl_eq_self Nat.ord_proj_mul_ord_compl_eq_self theorem ord_proj_mul {a b : ℕ} (p : ℕ) (ha : a ≠ 0) (hb : b ≠ 0) : ord_proj[p] (a * b) = ord_proj[p] a * ord_proj[p] b := by simp [factorization_mul ha hb, pow_add] #align nat.ord_proj_mul Nat.ord_proj_mul theorem ord_compl_mul (a b p : ℕ) : ord_compl[p] (a * b) = ord_compl[p] a * ord_compl[p] b := by if ha : a = 0 then simp [ha] else if hb : b = 0 then simp [hb] else simp only [ord_proj_mul p ha hb] rw [div_mul_div_comm (ord_proj_dvd a p) (ord_proj_dvd b p)] #align nat.ord_compl_mul Nat.ord_compl_mul #align nat.dvd_of_mem_factorization Nat.dvd_of_mem_primeFactors theorem factorization_lt {n : ℕ} (p : ℕ) (hn : n ≠ 0) : n.factorization p < n := by by_cases pp : p.Prime · exact (pow_lt_pow_iff_right pp.one_lt).1 <\| (ord_proj_le p hn).trans_lt <\| lt_pow_self pp.one_lt _ · simpa only [factorization_eq_zero_of_non_prime n pp] using hn.bot_lt #align nat.factorization_lt Nat.factorization_lt theorem factorization_le_of_le_pow {n p b : ℕ} (hb : n ≤ p ^ b) : n.factorization p ≤ b := by if hn : n = 0 then simp [hn] else if pp : p.Prime then exact (pow_le_pow_iff_right pp.one_lt).1 ((ord_proj_le p hn).trans hb) else simp [factorization_eq_zero_of_non_prime n pp] #align nat.factorization_le_of_le_pow Nat.factorization_le_of_le_pow theorem factorization_le_iff_dvd {d n : ℕ} (hd : d ≠ 0) (hn : n ≠ 0) : d.factorization ≤ n.factorization ↔ d ∣ n := by constructor · intro hdn set K := n.factorization - d.factorization with hK use K.prod (· ^ ·) rw [← factorization_prod_pow_eq_self hn, ← factorization_prod_pow_eq_self hd, ← Finsupp.prod_add_index' pow_zero pow_add, hK, add_tsub_cancel_of_le hdn] · rintro ⟨c, rfl⟩ rw [factorization_mul hd (right_ne_zero_of_mul hn)] simp #align nat.factorization_le_iff_dvd Nat.factorization_le_iff_dvd theorem factorization_prime_le_iff_dvd {d n : ℕ} (hd : d ≠ 0) (hn : n ≠ 0) : (∀ p : ℕ, p.Prime → d.factorization p ≤ n.factorization p) ↔ d ∣ n := by rw [← factorization_le_iff_dvd hd hn] refine ⟨fun h p => (em p.Prime).elim (h p) fun hp => ?_, fun h p _ => h p⟩ simp_rw [factorization_eq_zero_of_non_prime _ hp] rfl #align nat.factorization_prime_le_iff_dvd Nat.factorization_prime_le_iff_dvd theorem pow_succ_factorization_not_dvd {n p : ℕ} (hn : n ≠ 0) (hp : p.Prime) : ¬p ^ (n.factorization p + 1) ∣ n := by intro h rw [← factorization_le_iff_dvd (pow_pos hp.pos _).ne' hn] at h simpa [hp.factorization] using h p #align nat.pow_succ_factorization_not_dvd Nat.pow_succ_factorization_not_dvd theorem factorization_le_factorization_mul_left {a b : ℕ} (hb : b ≠ 0) : a.factorization ≤ (a * b).factorization := by rcases eq_or_ne a 0 with (rfl \| ha) · simp rw [factorization_le_iff_dvd ha <\| mul_ne_zero ha hb] exact Dvd.intro b rfl #align nat.factorization_le_factorization_mul_left Nat.factorization_le_factorization_mul_left theorem factorization_le_factorization_mul_right {a b : ℕ} (ha : a ≠ 0) : b.factorization ≤ (a * b).factorization := by rw [mul_comm] apply factorization_le_factorization_mul_left ha #align nat.factorization_le_factorization_mul_right Nat.factorization_le_factorization_mul_right theorem Prime.pow_dvd_iff_le_factorization {p k n : ℕ} (pp : Prime p) (hn : n ≠ 0) : p ^ k ∣ n ↔ k ≤ n.factorization p := by rw [← factorization_le_iff_dvd (pow_pos pp.pos k).ne' hn, pp.factorization_pow, single_le_iff] #align nat.prime.pow_dvd_iff_le_factorization Nat.Prime.pow_dvd_iff_le_factorization theorem Prime.pow_dvd_iff_dvd_ord_proj {p k n : ℕ} (pp : Prime p) (hn : n ≠ 0) : p ^ k ∣ n ↔ p ^ k ∣ ord_proj[p] n := by rw [pow_dvd_pow_iff_le_right pp.one_lt, pp.pow_dvd_iff_le_factorization hn] #align nat.prime.pow_dvd_iff_dvd_ord_proj Nat.Prime.pow_dvd_iff_dvd_ord_proj theorem Prime.dvd_iff_one_le_factorization {p n : ℕ} (pp : Prime p) (hn : n ≠ 0) : p ∣ n ↔ 1 ≤ n.factorization p := Iff.trans (by simp) (pp.pow_dvd_iff_le_factorization hn) #align nat.prime.dvd_iff_one_le_factorization Nat.Prime.dvd_iff_one_le_factorization theorem exists_factorization_lt_of_lt {a b : ℕ} (ha : a ≠ 0) (hab : a < b) : ∃ p : ℕ, a.factorization p < b.factorization p := by have hb : b ≠ 0 := (ha.bot_lt.trans hab).ne' contrapose! hab rw [← Finsupp.le_def, factorization_le_iff_dvd hb ha] at hab exact le_of_dvd ha.bot_lt hab #align nat.exists_factorization_lt_of_lt Nat.exists_factorization_lt_of_lt @[simp] theorem factorization_div {d n : ℕ} (h : d ∣ n) : (n / d).factorization = n.factorization - d.factorization := by rcases eq_or_ne d 0 with (rfl \| hd); · simp [zero_dvd_iff.mp h] rcases eq_or_ne n 0 with (rfl \| hn); · simp apply add_left_injective d.factorization simp only rw [tsub_add_cancel_of_le <\| (Nat.factorization_le_iff_dvd hd hn).mpr h, ← Nat.factorization_mul (Nat.div_pos (Nat.le_of_dvd hn.bot_lt h) hd.bot_lt).ne' hd, Nat.div_mul_cancel h] #align nat.factorization_div Nat.factorization_div theorem dvd_ord_proj_of_dvd {n p : ℕ} (hn : n ≠ 0) (pp : p.Prime) (h : p ∣ n) : p ∣ ord_proj[p] n := dvd_pow_self p (Prime.factorization_pos_of_dvd pp hn h).ne' #align nat.dvd_ord_proj_of_dvd Nat.dvd_ord_proj_of_dvd theorem not_dvd_ord_compl {n p : ℕ} (hp : Prime p) (hn : n ≠ 0) : ¬p ∣ ord_compl[p] n := by rw [Nat.Prime.dvd_iff_one_le_factorization hp (ord_compl_pos p hn).ne'] rw [Nat.factorization_div (Nat.ord_proj_dvd n p)] simp [hp.factorization] #align nat.not_dvd_ord_compl Nat.not_dvd_ord_compl theorem coprime_ord_compl {n p : ℕ} (hp : Prime p) (hn : n ≠ 0) : Coprime p (ord_compl[p] n) := (or_iff_left (not_dvd_ord_compl hp hn)).mp <\| coprime_or_dvd_of_prime hp _ #align nat.coprime_ord_compl Nat.coprime_ord_compl theorem factorization_ord_compl (n p : ℕ) : (ord_compl[p] n).factorization = n.factorization.erase p := by if hn : n = 0 then simp [hn] else if pp : p.Prime then ?_ else -- Porting note: needed to solve side goal explicitly rw [Finsupp.erase_of_not_mem_support] <;> simp [pp] ext q rcases eq_or_ne q p with (rfl \| hqp) · simp only [Finsupp.erase_same, factorization_eq_zero_iff, not_dvd_ord_compl pp hn] simp · rw [Finsupp.erase_ne hqp, factorization_div (ord_proj_dvd n p)] simp [pp.factorization, hqp.symm] #align nat.factorization_ord_compl Nat.factorization_ord_compl -- `ord_compl[p] n` is the largest divisor of `n` not divisible by `p`. theorem dvd_ord_compl_of_dvd_not_dvd {p d n : ℕ} (hdn : d ∣ n) (hpd : ¬p ∣ d) : d ∣ ord_compl[p] n := by if hn0 : n = 0 then simp [hn0] else if hd0 : d = 0 then simp [hd0] at hpd else rw [← factorization_le_iff_dvd hd0 (ord_compl_pos p hn0).ne', factorization_ord_compl] intro q if hqp : q = p then simp [factorization_eq_zero_iff, hqp, hpd] else simp [hqp, (factorization_le_iff_dvd hd0 hn0).2 hdn q] #align nat.dvd_ord_compl_of_dvd_not_dvd Nat.dvd_ord_compl_of_dvd_not_dvd theorem exists_eq_pow_mul_and_not_dvd {n : ℕ} (hn : n ≠ 0) (p : ℕ) (hp : p ≠ 1) : ∃ e n' : ℕ, ¬p ∣ n' ∧ n = p ^ e * n' := let ⟨a', h₁, h₂⟩ := multiplicity.exists_eq_pow_mul_and_not_dvd (multiplicity.finite_nat_iff.mpr ⟨hp, Nat.pos_of_ne_zero hn⟩) ⟨_, a', h₂, h₁⟩ #align nat.exists_eq_pow_mul_and_not_dvd Nat.exists_eq_pow_mul_and_not_dvd theorem dvd_iff_div_factorization_eq_tsub {d n : ℕ} (hd : d ≠ 0) (hdn : d ≤ n) : d ∣ n ↔ (n / d).factorization = n.factorization - d.factorization := by refine ⟨factorization_div, ?_⟩ rcases eq_or_lt_of_le hdn with (rfl \| hd_lt_n); · simp have h1 : n / d ≠ 0 := fun H => Nat.lt_asymm hd_lt_n ((Nat.div_eq_zero_iff hd.bot_lt).mp H) intro h rw [dvd_iff_le_div_mul n d] by_contra h2 cases' exists_factorization_lt_of_lt (mul_ne_zero h1 hd) (not_le.mp h2) with p hp rwa [factorization_mul h1 hd, add_apply, ← lt_tsub_iff_right, h, tsub_apply, lt_self_iff_false] at hp #align nat.dvd_iff_div_factorization_eq_tsub Nat.dvd_iff_div_factorization_eq_tsub theorem ord_proj_dvd_ord_proj_of_dvd {a b : ℕ} (hb0 : b ≠ 0) (hab : a ∣ b) (p : ℕ) : ord_proj[p] a ∣ ord_proj[p] b := by rcases em' p.Prime with (pp \| pp); · simp [pp] rcases eq_or_ne a 0 with (rfl \| ha0); · simp rw [pow_dvd_pow_iff_le_right pp.one_lt] exact (factorization_le_iff_dvd ha0 hb0).2 hab p #align nat.ord_proj_dvd_ord_proj_of_dvd Nat.ord_proj_dvd_ord_proj_of_dvd theorem ord_proj_dvd_ord_proj_iff_dvd {a b : ℕ} (ha0 : a ≠ 0) (hb0 : b ≠ 0) : (∀ p : ℕ, ord_proj[p] a ∣ ord_proj[p] b) ↔ a ∣ b := by refine ⟨fun h => ?_, fun hab p => ord_proj_dvd_ord_proj_of_dvd hb0 hab p⟩ rw [← factorization_le_iff_dvd ha0 hb0] intro q rcases le_or_lt q 1 with (hq_le \| hq1) · interval_cases q <;> simp exact (pow_dvd_pow_iff_le_right hq1).1 (h q) #align nat.ord_proj_dvd_ord_proj_iff_dvd Nat.ord_proj_dvd_ord_proj_iff_dvd theorem ord_compl_dvd_ord_compl_of_dvd {a b : ℕ} (hab : a ∣ b) (p : ℕ) : ord_compl[p] a ∣ ord_compl[p] b := by rcases em' p.Prime with (pp \| pp) · simp [pp, hab] rcases eq_or_ne b 0 with (rfl \| hb0) · simp rcases eq_or_ne a 0 with (rfl \| ha0) · cases hb0 (zero_dvd_iff.1 hab) have ha := (Nat.div_pos (ord_proj_le p ha0) (ord_proj_pos a p)).ne' have hb := (Nat.div_pos (ord_proj_le p hb0) (ord_proj_pos b p)).ne' rw [← factorization_le_iff_dvd ha hb, factorization_ord_compl a p, factorization_ord_compl b p] intro q rcases eq_or_ne q p with (rfl \| hqp) · simp simp_rw [erase_ne hqp] exact (factorization_le_iff_dvd ha0 hb0).2 hab q #align nat.ord_compl_dvd_ord_compl_of_dvd Nat.ord_compl_dvd_ord_compl_of_dvd theorem ord_compl_dvd_ord_compl_iff_dvd (a b : ℕ) : (∀ p : ℕ, ord_compl[p] a ∣ ord_compl[p] b) ↔ a ∣ b := by refine ⟨fun h => ?_, fun hab p => ord_compl_dvd_ord_compl_of_dvd hab p⟩ rcases eq_or_ne b 0 with (rfl \| hb0) · simp if pa : a.Prime then ?_ else simpa [pa] using h a if pb : b.Prime then ?_ else simpa [pb] using h b rw [prime_dvd_prime_iff_eq pa pb] by_contra hab apply pa.ne_one rw [← Nat.dvd_one, ← Nat.mul_dvd_mul_iff_left hb0.bot_lt, mul_one] simpa [Prime.factorization_self pb, Prime.factorization pa, hab] using h b #align nat.ord_compl_dvd_ord_compl_iff_dvd Nat.ord_compl_dvd_ord_compl_iff_dvd theorem dvd_iff_prime_pow_dvd_dvd (n d : ℕ) : d ∣ n ↔ ∀ p k : ℕ, Prime p → p ^ k ∣ d → p ^ k ∣ n := by rcases eq_or_ne n 0 with (rfl \| hn) · simp rcases eq_or_ne d 0 with (rfl \| hd) · simp only [zero_dvd_iff, hn, false_iff_iff, not_forall] exact ⟨2, n, prime_two, dvd_zero _, mt (le_of_dvd hn.bot_lt) (lt_two_pow n).not_le⟩ refine ⟨fun h p k _ hpkd => dvd_trans hpkd h, ?_⟩ rw [← factorization_prime_le_iff_dvd hd hn] intro h p pp simp_rw [← pp.pow_dvd_iff_le_factorization hn] exact h p _ pp (ord_proj_dvd _ _) #align nat.dvd_iff_prime_pow_dvd_dvd Nat.dvd_iff_prime_pow_dvd_dvd theorem prod_primeFactors_dvd (n : ℕ) : ∏ p ∈ n.primeFactors, p ∣ n := by by_cases hn : n = 0 · subst hn simp simpa [prod_factors hn] using Multiset.toFinset_prod_dvd_prod (n.factors : Multiset ℕ) #align nat.prod_prime_factors_dvd Nat.prod_primeFactors_dvd theorem factorization_gcd {a b : ℕ} (ha_pos : a ≠ 0) (hb_pos : b ≠ 0) : (gcd a b).factorization = a.factorization ⊓ b.factorization := by let dfac := a.factorization ⊓ b.factorization let d := dfac.prod (· ^ ·) have dfac_prime : ∀ p : ℕ, p ∈ dfac.support → Prime p := by intro p hp have : p ∈ a.factors ∧ p ∈ b.factors := by simpa [dfac] using hp exact prime_of_mem_factors this.1 have h1 : d.factorization = dfac := prod_pow_factorization_eq_self dfac_prime have hd_pos : d ≠ 0 := (factorizationEquiv.invFun ⟨dfac, dfac_prime⟩).2.ne' suffices d = gcd a b by rwa [← this] apply gcd_greatest · rw [← factorization_le_iff_dvd hd_pos ha_pos, h1] exact inf_le_left · rw [← factorization_le_iff_dvd hd_pos hb_pos, h1] exact inf_le_right · intro e hea heb rcases Decidable.eq_or_ne e 0 with (rfl \| he_pos) · simp only [zero_dvd_iff] at hea contradiction have hea' := (factorization_le_iff_dvd he_pos ha_pos).mpr hea have heb' := (factorization_le_iff_dvd he_pos hb_pos).mpr heb simp [dfac, ← factorization_le_iff_dvd he_pos hd_pos, h1, hea', heb'] #align nat.factorization_gcd Nat.factorization_gcd theorem factorization_lcm {a b : ℕ} (ha : a ≠ 0) (hb : b ≠ 0) : (a.lcm b).factorization = a.factorization ⊔ b.factorization := by rw [← add_right_inj (a.gcd b).factorization, ← factorization_mul (mt gcd_eq_zero_iff.1 fun h => ha h.1) (lcm_ne_zero ha hb), gcd_mul_lcm, factorization_gcd ha hb, factorization_mul ha hb] ext1 exact (min_add_max _ _).symm #align nat.factorization_lcm Nat.factorization_lcm def factorizationLCMLeft (a b : ℕ) : ℕ := (Nat.lcm a b).factorization.prod fun p n ↦ if b.factorization p ≤ a.factorization p then p ^ n else 1 def factorizationLCMRight (a b : ℕ) := (Nat.lcm a b).factorization.prod fun p n ↦ if b.factorization p ≤ a.factorization p then 1 else p ^ n variable (a b) @[simp] lemma factorizationLCMLeft_zero_left : factorizationLCMLeft 0 b = 1 := by simp [factorizationLCMLeft] @[simp] lemma factorizationLCMLeft_zero_right : factorizationLCMLeft a 0 = 1 := by simp [factorizationLCMLeft] @[simp] lemma factorizationLCRight_zero_left : factorizationLCMRight 0 b = 1 := by simp [factorizationLCMRight] @[simp] lemma factorizationLCMRight_zero_right : factorizationLCMRight a 0 = 1 := by simp [factorizationLCMRight] lemma factorizationLCMLeft_pos : 0 < factorizationLCMLeft a b := by apply Nat.pos_of_ne_zero rw [factorizationLCMLeft, Finsupp.prod_ne_zero_iff] intro p _ H by_cases h : b.factorization p ≤ a.factorization p · simp only [h, reduceIte, pow_eq_zero_iff', ne_eq] at H simpa [H.1] using H.2 · simp only [h, reduceIte, one_ne_zero] at H lemma factorizationLCMRight_pos : 0 < factorizationLCMRight a b := by apply Nat.pos_of_ne_zero rw [factorizationLCMRight, Finsupp.prod_ne_zero_iff] intro p _ H by_cases h : b.factorization p ≤ a.factorization p · simp only [h, reduceIte, pow_eq_zero_iff', ne_eq] at H · simp only [h, ↓reduceIte, pow_eq_zero_iff', ne_eq] at H simpa [H.1] using H.2 lemma coprime_factorizationLCMLeft_factorizationLCMRight : (factorizationLCMLeft a b).Coprime (factorizationLCMRight a b) := by rw [factorizationLCMLeft, factorizationLCMRight] refine coprime_prod_left_iff.mpr fun p hp ↦ coprime_prod_right_iff.mpr fun q hq ↦ ?_ dsimp only; split_ifs with h h' any_goals simp only [coprime_one_right_eq_true, coprime_one_left_eq_true] refine coprime_pow_primes _ _ (prime_of_mem_primeFactors hp) (prime_of_mem_primeFactors hq) ?_ contrapose! h'; rwa [← h'] variable {a b} lemma factorizationLCMLeft_mul_factorizationLCMRight (ha : a ≠ 0) (hb : b ≠ 0) : (factorizationLCMLeft a b) * (factorizationLCMRight a b) = lcm a b := by rw [← factorization_prod_pow_eq_self (lcm_ne_zero ha hb), factorizationLCMLeft, factorizationLCMRight, ← prod_mul] congr; ext p n; split_ifs <;> simp variable (a b) lemma factorizationLCMLeft_dvd_left : factorizationLCMLeft a b ∣ a := by rcases eq_or_ne a 0 with rfl \| ha · simp only [dvd_zero] rcases eq_or_ne b 0 with rfl \| hb · simp [factorizationLCMLeft] nth_rewrite 2 [← factorization_prod_pow_eq_self ha] rw [prod_of_support_subset (s := (lcm a b).factorization.support)] · apply prod_dvd_prod_of_dvd; rintro p -; dsimp only; split_ifs with le · rw [factorization_lcm ha hb]; apply pow_dvd_pow; exact sup_le le_rfl le · apply one_dvd · intro p hp; rw [mem_support_iff] at hp ⊢ rw [factorization_lcm ha hb]; exact (lt_sup_iff.mpr <\| .inl <\| Nat.pos_of_ne_zero hp).ne' · intros; rw [pow_zero] lemma factorizationLCMRight_dvd_right : factorizationLCMRight a b ∣ b := by rcases eq_or_ne a 0 with rfl \| ha · simp [factorizationLCMRight] rcases eq_or_ne b 0 with rfl \| hb · simp only [dvd_zero] nth_rewrite 2 [← factorization_prod_pow_eq_self hb] rw [prod_of_support_subset (s := (lcm a b).factorization.support)] · apply Finset.prod_dvd_prod_of_dvd; rintro p -; dsimp only; split_ifs with le · apply one_dvd · rw [factorization_lcm ha hb]; apply pow_dvd_pow; exact sup_le (not_le.1 le).le le_rfl · intro p hp; rw [mem_support_iff] at hp ⊢ rw [factorization_lcm ha hb]; exact (lt_sup_iff.mpr <\| .inr <\| Nat.pos_of_ne_zero hp).ne' · intros; rw [pow_zero] @[to_additive sum_primeFactors_gcd_add_sum_primeFactors_mul] theorem prod_primeFactors_gcd_mul_prod_primeFactors_mul {β : Type} [CommMonoid β] (m n : ℕ) (f : ℕ → β) : (m.gcd n).primeFactors.prod f (m * n).primeFactors.prod f = m.primeFactors.prod f * n.primeFactors.prod f := by obtain rfl \| hm₀ := eq_or_ne m 0 · simp obtain rfl \| hn₀ := eq_or_ne n 0 · simp · rw [primeFactors_mul hm₀ hn₀, primeFactors_gcd hm₀ hn₀, mul_comm, Finset.prod_union_inter] #align nat.prod_factors_gcd_mul_prod_factors_mul Nat.prod_primeFactors_gcd_mul_prod_primeFactors_mul #align nat.sum_factors_gcd_add_sum_factors_mul Nat.sum_primeFactors_gcd_add_sum_primeFactors_mul theorem setOf_pow_dvd_eq_Icc_factorization {n p : ℕ} (pp : p.Prime) (hn : n ≠ 0) : { i : ℕ \| i ≠ 0 ∧ p ^ i ∣ n } = Set.Icc 1 (n.factorization p) := by ext simp [Nat.lt_succ_iff, one_le_iff_ne_zero, pp.pow_dvd_iff_le_factorization hn] #align nat.set_of_pow_dvd_eq_Icc_factorization Nat.setOf_pow_dvd_eq_Icc_factorization theorem Icc_factorization_eq_pow_dvd (n : ℕ) {p : ℕ} (pp : Prime p) : Icc 1 (n.factorization p) = (Ico 1 n).filter fun i : ℕ => p ^ i ∣ n := by rcases eq_or_ne n 0 with (rfl \| hn) · simp ext x simp only [mem_Icc, Finset.mem_filter, mem_Ico, and_assoc, and_congr_right_iff, pp.pow_dvd_iff_le_factorization hn, iff_and_self] exact fun _ H => lt_of_le_of_lt H (factorization_lt p hn) #align nat.Icc_factorization_eq_pow_dvd Nat.Icc_factorization_eq_pow_dvd	Mathlib/Data/Nat/Factorization/Basic.lean	790	792	theorem factorization_eq_card_pow_dvd (n : ℕ) {p : ℕ} (pp : p.Prime) : n.factorization p = ((Ico 1 n).filter fun i => p ^ i ∣ n).card := by	simp [← Icc_factorization_eq_pow_dvd n pp]
import Mathlib.Order.Interval.Set.UnorderedInterval import Mathlib.Algebra.Order.Interval.Set.Monoid import Mathlib.Data.Set.Pointwise.Basic import Mathlib.Algebra.Order.Field.Basic import Mathlib.Algebra.Order.Group.MinMax #align_import data.set.pointwise.interval from "leanprover-community/mathlib"@"2196ab363eb097c008d4497125e0dde23fb36db2" open Interval Pointwise variable {α : Type} namespace Set section LinearOrderedField variable [LinearOrderedField α] {a : α} @[simp] theorem preimage_mul_const_Iio (a : α) {c : α} (h : 0 < c) : (fun x => x c) ⁻¹' Iio a = Iio (a / c) := ext fun _x => (lt_div_iff h).symm #align set.preimage_mul_const_Iio Set.preimage_mul_const_Iio @[simp] theorem preimage_mul_const_Ioi (a : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ioi a = Ioi (a / c) := ext fun _x => (div_lt_iff h).symm #align set.preimage_mul_const_Ioi Set.preimage_mul_const_Ioi @[simp] theorem preimage_mul_const_Iic (a : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Iic a = Iic (a / c) := ext fun _x => (le_div_iff h).symm #align set.preimage_mul_const_Iic Set.preimage_mul_const_Iic @[simp] theorem preimage_mul_const_Ici (a : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ici a = Ici (a / c) := ext fun _x => (div_le_iff h).symm #align set.preimage_mul_const_Ici Set.preimage_mul_const_Ici @[simp] theorem preimage_mul_const_Ioo (a b : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ioo a b = Ioo (a / c) (b / c) := by simp [← Ioi_inter_Iio, h] #align set.preimage_mul_const_Ioo Set.preimage_mul_const_Ioo @[simp] theorem preimage_mul_const_Ioc (a b : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ioc a b = Ioc (a / c) (b / c) := by simp [← Ioi_inter_Iic, h] #align set.preimage_mul_const_Ioc Set.preimage_mul_const_Ioc @[simp] theorem preimage_mul_const_Ico (a b : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ico a b = Ico (a / c) (b / c) := by simp [← Ici_inter_Iio, h] #align set.preimage_mul_const_Ico Set.preimage_mul_const_Ico @[simp] theorem preimage_mul_const_Icc (a b : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Icc a b = Icc (a / c) (b / c) := by simp [← Ici_inter_Iic, h] #align set.preimage_mul_const_Icc Set.preimage_mul_const_Icc @[simp] theorem preimage_mul_const_Iio_of_neg (a : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Iio a = Ioi (a / c) := ext fun _x => (div_lt_iff_of_neg h).symm #align set.preimage_mul_const_Iio_of_neg Set.preimage_mul_const_Iio_of_neg @[simp] theorem preimage_mul_const_Ioi_of_neg (a : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Ioi a = Iio (a / c) := ext fun _x => (lt_div_iff_of_neg h).symm #align set.preimage_mul_const_Ioi_of_neg Set.preimage_mul_const_Ioi_of_neg @[simp] theorem preimage_mul_const_Iic_of_neg (a : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Iic a = Ici (a / c) := ext fun _x => (div_le_iff_of_neg h).symm #align set.preimage_mul_const_Iic_of_neg Set.preimage_mul_const_Iic_of_neg @[simp] theorem preimage_mul_const_Ici_of_neg (a : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Ici a = Iic (a / c) := ext fun _x => (le_div_iff_of_neg h).symm #align set.preimage_mul_const_Ici_of_neg Set.preimage_mul_const_Ici_of_neg @[simp] theorem preimage_mul_const_Ioo_of_neg (a b : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Ioo a b = Ioo (b / c) (a / c) := by simp [← Ioi_inter_Iio, h, inter_comm] #align set.preimage_mul_const_Ioo_of_neg Set.preimage_mul_const_Ioo_of_neg @[simp] theorem preimage_mul_const_Ioc_of_neg (a b : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Ioc a b = Ico (b / c) (a / c) := by simp [← Ioi_inter_Iic, ← Ici_inter_Iio, h, inter_comm] #align set.preimage_mul_const_Ioc_of_neg Set.preimage_mul_const_Ioc_of_neg @[simp] theorem preimage_mul_const_Ico_of_neg (a b : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Ico a b = Ioc (b / c) (a / c) := by simp [← Ici_inter_Iio, ← Ioi_inter_Iic, h, inter_comm] #align set.preimage_mul_const_Ico_of_neg Set.preimage_mul_const_Ico_of_neg @[simp] theorem preimage_mul_const_Icc_of_neg (a b : α) {c : α} (h : c < 0) : (fun x => x * c) ⁻¹' Icc a b = Icc (b / c) (a / c) := by simp [← Ici_inter_Iic, h, inter_comm] #align set.preimage_mul_const_Icc_of_neg Set.preimage_mul_const_Icc_of_neg @[simp] theorem preimage_const_mul_Iio (a : α) {c : α} (h : 0 < c) : (c * ·) ⁻¹' Iio a = Iio (a / c) := ext fun _x => (lt_div_iff' h).symm #align set.preimage_const_mul_Iio Set.preimage_const_mul_Iio @[simp] theorem preimage_const_mul_Ioi (a : α) {c : α} (h : 0 < c) : (c * ·) ⁻¹' Ioi a = Ioi (a / c) := ext fun _x => (div_lt_iff' h).symm #align set.preimage_const_mul_Ioi Set.preimage_const_mul_Ioi @[simp] theorem preimage_const_mul_Iic (a : α) {c : α} (h : 0 < c) : (c * ·) ⁻¹' Iic a = Iic (a / c) := ext fun _x => (le_div_iff' h).symm #align set.preimage_const_mul_Iic Set.preimage_const_mul_Iic @[simp] theorem preimage_const_mul_Ici (a : α) {c : α} (h : 0 < c) : (c * ·) ⁻¹' Ici a = Ici (a / c) := ext fun _x => (div_le_iff' h).symm #align set.preimage_const_mul_Ici Set.preimage_const_mul_Ici @[simp] theorem preimage_const_mul_Ioo (a b : α) {c : α} (h : 0 < c) : (c * ·) ⁻¹' Ioo a b = Ioo (a / c) (b / c) := by simp [← Ioi_inter_Iio, h] #align set.preimage_const_mul_Ioo Set.preimage_const_mul_Ioo @[simp]	Mathlib/Data/Set/Pointwise/Interval.lean	710	711	theorem preimage_const_mul_Ioc (a b : α) {c : α} (h : 0 < c) : (c * ·) ⁻¹' Ioc a b = Ioc (a / c) (b / c) := by	simp [← Ioi_inter_Iic, h]
import Mathlib.Order.Filter.Lift import Mathlib.Topology.Defs.Filter #align_import topology.basic from "leanprover-community/mathlib"@"e354e865255654389cc46e6032160238df2e0f40" noncomputable section open Set Filter universe u v w x def TopologicalSpace.ofClosed {X : Type u} (T : Set (Set X)) (empty_mem : ∅ ∈ T) (sInter_mem : ∀ A, A ⊆ T → ⋂₀ A ∈ T) (union_mem : ∀ A, A ∈ T → ∀ B, B ∈ T → A ∪ B ∈ T) : TopologicalSpace X where IsOpen X := Xᶜ ∈ T isOpen_univ := by simp [empty_mem] isOpen_inter s t hs ht := by simpa only [compl_inter] using union_mem sᶜ hs tᶜ ht isOpen_sUnion s hs := by simp only [Set.compl_sUnion] exact sInter_mem (compl '' s) fun z ⟨y, hy, hz⟩ => hz ▸ hs y hy #align topological_space.of_closed TopologicalSpace.ofClosed section TopologicalSpace variable {X : Type u} {Y : Type v} {ι : Sort w} {α β : Type} {x : X} {s s₁ s₂ t : Set X} {p p₁ p₂ : X → Prop} open Topology lemma isOpen_mk {p h₁ h₂ h₃} : IsOpen[⟨p, h₁, h₂, h₃⟩] s ↔ p s := Iff.rfl #align is_open_mk isOpen_mk @[ext] protected theorem TopologicalSpace.ext : ∀ {f g : TopologicalSpace X}, IsOpen[f] = IsOpen[g] → f = g \| ⟨_, _, _, _⟩, ⟨_, _, _, _⟩, rfl => rfl #align topological_space_eq TopologicalSpace.ext section variable [TopologicalSpace X] end protected theorem TopologicalSpace.ext_iff {t t' : TopologicalSpace X} : t = t' ↔ ∀ s, IsOpen[t] s ↔ IsOpen[t'] s := ⟨fun h s => h ▸ Iff.rfl, fun h => by ext; exact h _⟩ #align topological_space_eq_iff TopologicalSpace.ext_iff theorem isOpen_fold {t : TopologicalSpace X} : t.IsOpen s = IsOpen[t] s := rfl #align is_open_fold isOpen_fold variable [TopologicalSpace X] theorem isOpen_iUnion {f : ι → Set X} (h : ∀ i, IsOpen (f i)) : IsOpen (⋃ i, f i) := isOpen_sUnion (forall_mem_range.2 h) #align is_open_Union isOpen_iUnion theorem isOpen_biUnion {s : Set α} {f : α → Set X} (h : ∀ i ∈ s, IsOpen (f i)) : IsOpen (⋃ i ∈ s, f i) := isOpen_iUnion fun i => isOpen_iUnion fun hi => h i hi #align is_open_bUnion isOpen_biUnion theorem IsOpen.union (h₁ : IsOpen s₁) (h₂ : IsOpen s₂) : IsOpen (s₁ ∪ s₂) := by rw [union_eq_iUnion]; exact isOpen_iUnion (Bool.forall_bool.2 ⟨h₂, h₁⟩) #align is_open.union IsOpen.union lemma isOpen_iff_of_cover {f : α → Set X} (ho : ∀ i, IsOpen (f i)) (hU : (⋃ i, f i) = univ) : IsOpen s ↔ ∀ i, IsOpen (f i ∩ s) := by refine ⟨fun h i ↦ (ho i).inter h, fun h ↦ ?_⟩ rw [← s.inter_univ, inter_comm, ← hU, iUnion_inter] exact isOpen_iUnion fun i ↦ h i @[simp] theorem isOpen_empty : IsOpen (∅ : Set X) := by rw [← sUnion_empty]; exact isOpen_sUnion fun a => False.elim #align is_open_empty isOpen_empty theorem Set.Finite.isOpen_sInter {s : Set (Set X)} (hs : s.Finite) : (∀ t ∈ s, IsOpen t) → IsOpen (⋂₀ s) := Finite.induction_on hs (fun _ => by rw [sInter_empty]; exact isOpen_univ) fun _ _ ih h => by simp only [sInter_insert, forall_mem_insert] at h ⊢ exact h.1.inter (ih h.2) #align is_open_sInter Set.Finite.isOpen_sInter theorem Set.Finite.isOpen_biInter {s : Set α} {f : α → Set X} (hs : s.Finite) (h : ∀ i ∈ s, IsOpen (f i)) : IsOpen (⋂ i ∈ s, f i) := sInter_image f s ▸ (hs.image _).isOpen_sInter (forall_mem_image.2 h) #align is_open_bInter Set.Finite.isOpen_biInter theorem isOpen_iInter_of_finite [Finite ι] {s : ι → Set X} (h : ∀ i, IsOpen (s i)) : IsOpen (⋂ i, s i) := (finite_range _).isOpen_sInter (forall_mem_range.2 h) #align is_open_Inter isOpen_iInter_of_finite theorem isOpen_biInter_finset {s : Finset α} {f : α → Set X} (h : ∀ i ∈ s, IsOpen (f i)) : IsOpen (⋂ i ∈ s, f i) := s.finite_toSet.isOpen_biInter h #align is_open_bInter_finset isOpen_biInter_finset @[simp] -- Porting note: added `simp` theorem isOpen_const {p : Prop} : IsOpen { _x : X \| p } := by by_cases p <;> simp [] #align is_open_const isOpen_const theorem IsOpen.and : IsOpen { x \| p₁ x } → IsOpen { x \| p₂ x } → IsOpen { x \| p₁ x ∧ p₂ x } := IsOpen.inter #align is_open.and IsOpen.and @[simp] theorem isOpen_compl_iff : IsOpen sᶜ ↔ IsClosed s := ⟨fun h => ⟨h⟩, fun h => h.isOpen_compl⟩ #align is_open_compl_iff isOpen_compl_iff theorem TopologicalSpace.ext_iff_isClosed {t₁ t₂ : TopologicalSpace X} : t₁ = t₂ ↔ ∀ s, IsClosed[t₁] s ↔ IsClosed[t₂] s := by rw [TopologicalSpace.ext_iff, compl_surjective.forall] simp only [@isOpen_compl_iff _ _ t₁, @isOpen_compl_iff _ _ t₂] alias ⟨_, TopologicalSpace.ext_isClosed⟩ := TopologicalSpace.ext_iff_isClosed -- Porting note (#10756): new lemma theorem isClosed_const {p : Prop} : IsClosed { _x : X \| p } := ⟨isOpen_const (p := ¬p)⟩ @[simp] theorem isClosed_empty : IsClosed (∅ : Set X) := isClosed_const #align is_closed_empty isClosed_empty @[simp] theorem isClosed_univ : IsClosed (univ : Set X) := isClosed_const #align is_closed_univ isClosed_univ theorem IsClosed.union : IsClosed s₁ → IsClosed s₂ → IsClosed (s₁ ∪ s₂) := by simpa only [← isOpen_compl_iff, compl_union] using IsOpen.inter #align is_closed.union IsClosed.union theorem isClosed_sInter {s : Set (Set X)} : (∀ t ∈ s, IsClosed t) → IsClosed (⋂₀ s) := by simpa only [← isOpen_compl_iff, compl_sInter, sUnion_image] using isOpen_biUnion #align is_closed_sInter isClosed_sInter theorem isClosed_iInter {f : ι → Set X} (h : ∀ i, IsClosed (f i)) : IsClosed (⋂ i, f i) := isClosed_sInter <\| forall_mem_range.2 h #align is_closed_Inter isClosed_iInter theorem isClosed_biInter {s : Set α} {f : α → Set X} (h : ∀ i ∈ s, IsClosed (f i)) : IsClosed (⋂ i ∈ s, f i) := isClosed_iInter fun i => isClosed_iInter <\| h i #align is_closed_bInter isClosed_biInter @[simp]	Mathlib/Topology/Basic.lean	198	199	theorem isClosed_compl_iff {s : Set X} : IsClosed sᶜ ↔ IsOpen s := by	rw [← isOpen_compl_iff, compl_compl]
import Mathlib.Probability.ProbabilityMassFunction.Monad #align_import probability.probability_mass_function.constructions from "leanprover-community/mathlib"@"4ac69b290818724c159de091daa3acd31da0ee6d" universe u namespace PMF noncomputable section variable {α β γ : Type} open scoped Classical open NNReal ENNReal section Map def map (f : α → β) (p : PMF α) : PMF β := bind p (pure ∘ f) #align pmf.map PMF.map variable (f : α → β) (p : PMF α) (b : β) theorem monad_map_eq_map {α β : Type u} (f : α → β) (p : PMF α) : f <$> p = p.map f := rfl #align pmf.monad_map_eq_map PMF.monad_map_eq_map @[simp] theorem map_apply : (map f p) b = ∑' a, if b = f a then p a else 0 := by simp [map] #align pmf.map_apply PMF.map_apply @[simp] theorem support_map : (map f p).support = f '' p.support := Set.ext fun b => by simp [map, @eq_comm β b] #align pmf.support_map PMF.support_map theorem mem_support_map_iff : b ∈ (map f p).support ↔ ∃ a ∈ p.support, f a = b := by simp #align pmf.mem_support_map_iff PMF.mem_support_map_iff theorem bind_pure_comp : bind p (pure ∘ f) = map f p := rfl #align pmf.bind_pure_comp PMF.bind_pure_comp theorem map_id : map id p = p := bind_pure _ #align pmf.map_id PMF.map_id theorem map_comp (g : β → γ) : (p.map f).map g = p.map (g ∘ f) := by simp [map, Function.comp] #align pmf.map_comp PMF.map_comp theorem pure_map (a : α) : (pure a).map f = pure (f a) := pure_bind _ _ #align pmf.pure_map PMF.pure_map theorem map_bind (q : α → PMF β) (f : β → γ) : (p.bind q).map f = p.bind fun a => (q a).map f := bind_bind _ _ _ #align pmf.map_bind PMF.map_bind @[simp] theorem bind_map (p : PMF α) (f : α → β) (q : β → PMF γ) : (p.map f).bind q = p.bind (q ∘ f) := (bind_bind _ _ _).trans (congr_arg _ (funext fun _ => pure_bind _ _)) #align pmf.bind_map PMF.bind_map @[simp] theorem map_const : p.map (Function.const α b) = pure b := by simp only [map, Function.comp, bind_const, Function.const] #align pmf.map_const PMF.map_const section Seq def seq (q : PMF (α → β)) (p : PMF α) : PMF β := q.bind fun m => p.bind fun a => pure (m a) #align pmf.seq PMF.seq variable (q : PMF (α → β)) (p : PMF α) (b : β) theorem monad_seq_eq_seq {α β : Type u} (q : PMF (α → β)) (p : PMF α) : q <> p = q.seq p := rfl #align pmf.monad_seq_eq_seq PMF.monad_seq_eq_seq @[simp]	Mathlib/Probability/ProbabilityMassFunction/Constructions.lean	125	128	theorem seq_apply : (seq q p) b = ∑' (f : α → β) (a : α), if b = f a then q f * p a else 0 := by	simp only [seq, mul_boole, bind_apply, pure_apply] refine tsum_congr fun f => ENNReal.tsum_mul_left.symm.trans (tsum_congr fun a => ?_) simpa only [mul_zero] using mul_ite (b = f a) (q f) (p a) 0
import Mathlib.RingTheory.Ideal.Maps #align_import ring_theory.ideal.prod from "leanprover-community/mathlib"@"052f6013363326d50cb99c6939814a4b8eb7b301" universe u v variable {R : Type u} {S : Type v} [Semiring R] [Semiring S] (I I' : Ideal R) (J J' : Ideal S) namespace Ideal def prod : Ideal (R × S) where carrier := { x \| x.fst ∈ I ∧ x.snd ∈ J } zero_mem' := by simp add_mem' := by rintro ⟨a₁, a₂⟩ ⟨b₁, b₂⟩ ⟨ha₁, ha₂⟩ ⟨hb₁, hb₂⟩ exact ⟨I.add_mem ha₁ hb₁, J.add_mem ha₂ hb₂⟩ smul_mem' := by rintro ⟨a₁, a₂⟩ ⟨b₁, b₂⟩ ⟨hb₁, hb₂⟩ exact ⟨I.mul_mem_left _ hb₁, J.mul_mem_left _ hb₂⟩ #align ideal.prod Ideal.prod @[simp] theorem mem_prod {r : R} {s : S} : (⟨r, s⟩ : R × S) ∈ prod I J ↔ r ∈ I ∧ s ∈ J := Iff.rfl #align ideal.mem_prod Ideal.mem_prod @[simp] theorem prod_top_top : prod (⊤ : Ideal R) (⊤ : Ideal S) = ⊤ := Ideal.ext <\| by simp #align ideal.prod_top_top Ideal.prod_top_top theorem ideal_prod_eq (I : Ideal (R × S)) : I = Ideal.prod (map (RingHom.fst R S) I : Ideal R) (map (RingHom.snd R S) I) := by apply Ideal.ext rintro ⟨r, s⟩ rw [mem_prod, mem_map_iff_of_surjective (RingHom.fst R S) Prod.fst_surjective, mem_map_iff_of_surjective (RingHom.snd R S) Prod.snd_surjective] refine ⟨fun h => ⟨⟨_, ⟨h, rfl⟩⟩, ⟨_, ⟨h, rfl⟩⟩⟩, ?_⟩ rintro ⟨⟨⟨r, s'⟩, ⟨h₁, rfl⟩⟩, ⟨⟨r', s⟩, ⟨h₂, rfl⟩⟩⟩ simpa using I.add_mem (I.mul_mem_left (1, 0) h₁) (I.mul_mem_left (0, 1) h₂) #align ideal.ideal_prod_eq Ideal.ideal_prod_eq @[simp] theorem map_fst_prod (I : Ideal R) (J : Ideal S) : map (RingHom.fst R S) (prod I J) = I := by ext x rw [mem_map_iff_of_surjective (RingHom.fst R S) Prod.fst_surjective] exact ⟨by rintro ⟨x, ⟨h, rfl⟩⟩ exact h.1, fun h => ⟨⟨x, 0⟩, ⟨⟨h, Ideal.zero_mem _⟩, rfl⟩⟩⟩ #align ideal.map_fst_prod Ideal.map_fst_prod @[simp] theorem map_snd_prod (I : Ideal R) (J : Ideal S) : map (RingHom.snd R S) (prod I J) = J := by ext x rw [mem_map_iff_of_surjective (RingHom.snd R S) Prod.snd_surjective] exact ⟨by rintro ⟨x, ⟨h, rfl⟩⟩ exact h.2, fun h => ⟨⟨0, x⟩, ⟨⟨Ideal.zero_mem _, h⟩, rfl⟩⟩⟩ #align ideal.map_snd_prod Ideal.map_snd_prod @[simp] theorem map_prodComm_prod : map ((RingEquiv.prodComm : R × S ≃+* S × R) : R × S →+* S × R) (prod I J) = prod J I := by refine Trans.trans (ideal_prod_eq _) ?_ simp [map_map] #align ideal.map_prod_comm_prod Ideal.map_prodComm_prod def idealProdEquiv : Ideal (R × S) ≃ Ideal R × Ideal S where toFun I := ⟨map (RingHom.fst R S) I, map (RingHom.snd R S) I⟩ invFun I := prod I.1 I.2 left_inv I := (ideal_prod_eq I).symm right_inv := fun ⟨I, J⟩ => by simp #align ideal.ideal_prod_equiv Ideal.idealProdEquiv @[simp] theorem idealProdEquiv_symm_apply (I : Ideal R) (J : Ideal S) : idealProdEquiv.symm ⟨I, J⟩ = prod I J := rfl #align ideal.ideal_prod_equiv_symm_apply Ideal.idealProdEquiv_symm_apply	Mathlib/RingTheory/Ideal/Prod.lean	103	105	theorem prod.ext_iff {I I' : Ideal R} {J J' : Ideal S} : prod I J = prod I' J' ↔ I = I' ∧ J = J' := by	simp only [← idealProdEquiv_symm_apply, idealProdEquiv.symm.injective.eq_iff, Prod.mk.inj_iff]
import Mathlib.Algebra.CharP.Defs import Mathlib.RingTheory.Multiplicity import Mathlib.RingTheory.PowerSeries.Basic #align_import ring_theory.power_series.basic from "leanprover-community/mathlib"@"2d5739b61641ee4e7e53eca5688a08f66f2e6a60" noncomputable section open Polynomial open Finset (antidiagonal mem_antidiagonal) namespace PowerSeries open Finsupp (single) variable {R : Type*} section OrderBasic open multiplicity variable [Semiring R] {φ : R⟦X⟧} theorem exists_coeff_ne_zero_iff_ne_zero : (∃ n : ℕ, coeff R n φ ≠ 0) ↔ φ ≠ 0 := by refine not_iff_not.mp ?_ push_neg -- FIXME: the `FunLike.coe` doesn't seem to be picked up in the expression after #8386? simp [PowerSeries.ext_iff, (coeff R _).map_zero] #align power_series.exists_coeff_ne_zero_iff_ne_zero PowerSeries.exists_coeff_ne_zero_iff_ne_zero def order (φ : R⟦X⟧) : PartENat := letI := Classical.decEq R letI := Classical.decEq R⟦X⟧ if h : φ = 0 then ⊤ else Nat.find (exists_coeff_ne_zero_iff_ne_zero.mpr h) #align power_series.order PowerSeries.order @[simp] theorem order_zero : order (0 : R⟦X⟧) = ⊤ := dif_pos rfl #align power_series.order_zero PowerSeries.order_zero theorem order_finite_iff_ne_zero : (order φ).Dom ↔ φ ≠ 0 := by simp only [order] constructor · split_ifs with h <;> intro H · simp only [PartENat.top_eq_none, Part.not_none_dom] at H · exact h · intro h simp [h] #align power_series.order_finite_iff_ne_zero PowerSeries.order_finite_iff_ne_zero theorem coeff_order (h : (order φ).Dom) : coeff R (φ.order.get h) φ ≠ 0 := by classical simp only [order, order_finite_iff_ne_zero.mp h, not_false_iff, dif_neg, PartENat.get_natCast'] generalize_proofs h exact Nat.find_spec h #align power_series.coeff_order PowerSeries.coeff_order theorem order_le (n : ℕ) (h : coeff R n φ ≠ 0) : order φ ≤ n := by classical rw [order, dif_neg] · simp only [PartENat.coe_le_coe] exact Nat.find_le h · exact exists_coeff_ne_zero_iff_ne_zero.mp ⟨n, h⟩ #align power_series.order_le PowerSeries.order_le theorem coeff_of_lt_order (n : ℕ) (h : ↑n < order φ) : coeff R n φ = 0 := by contrapose! h exact order_le _ h #align power_series.coeff_of_lt_order PowerSeries.coeff_of_lt_order @[simp] theorem order_eq_top {φ : R⟦X⟧} : φ.order = ⊤ ↔ φ = 0 := PartENat.not_dom_iff_eq_top.symm.trans order_finite_iff_ne_zero.not_left #align power_series.order_eq_top PowerSeries.order_eq_top theorem nat_le_order (φ : R⟦X⟧) (n : ℕ) (h : ∀ i < n, coeff R i φ = 0) : ↑n ≤ order φ := by by_contra H; rw [not_le] at H have : (order φ).Dom := PartENat.dom_of_le_natCast H.le rw [← PartENat.natCast_get this, PartENat.coe_lt_coe] at H exact coeff_order this (h _ H) #align power_series.nat_le_order PowerSeries.nat_le_order	Mathlib/RingTheory/PowerSeries/Order.lean	121	129	theorem le_order (φ : R⟦X⟧) (n : PartENat) (h : ∀ i : ℕ, ↑i < n → coeff R i φ = 0) : n ≤ order φ := by	induction n using PartENat.casesOn · show _ ≤ _ rw [top_le_iff, order_eq_top] ext i exact h _ (PartENat.natCast_lt_top i) · apply nat_le_order simpa only [PartENat.coe_lt_coe] using h
import Mathlib.Data.Finset.Image #align_import data.finset.card from "leanprover-community/mathlib"@"65a1391a0106c9204fe45bc73a039f056558cb83" assert_not_exists MonoidWithZero -- TODO: After a lot more work, -- assert_not_exists OrderedCommMonoid open Function Multiset Nat variable {α β R : Type*} namespace Finset variable {s t : Finset α} {a b : α} def card (s : Finset α) : ℕ := Multiset.card s.1 #align finset.card Finset.card theorem card_def (s : Finset α) : s.card = Multiset.card s.1 := rfl #align finset.card_def Finset.card_def @[simp] lemma card_val (s : Finset α) : Multiset.card s.1 = s.card := rfl #align finset.card_val Finset.card_val @[simp] theorem card_mk {m nodup} : (⟨m, nodup⟩ : Finset α).card = Multiset.card m := rfl #align finset.card_mk Finset.card_mk @[simp] theorem card_empty : card (∅ : Finset α) = 0 := rfl #align finset.card_empty Finset.card_empty @[gcongr] theorem card_le_card : s ⊆ t → s.card ≤ t.card := Multiset.card_le_card ∘ val_le_iff.mpr #align finset.card_le_of_subset Finset.card_le_card @[mono] theorem card_mono : Monotone (@card α) := by apply card_le_card #align finset.card_mono Finset.card_mono @[simp] lemma card_eq_zero : s.card = 0 ↔ s = ∅ := card_eq_zero.trans val_eq_zero lemma card_ne_zero : s.card ≠ 0 ↔ s.Nonempty := card_eq_zero.ne.trans nonempty_iff_ne_empty.symm lemma card_pos : 0 < s.card ↔ s.Nonempty := Nat.pos_iff_ne_zero.trans card_ne_zero #align finset.card_eq_zero Finset.card_eq_zero #align finset.card_pos Finset.card_pos alias ⟨_, Nonempty.card_pos⟩ := card_pos alias ⟨_, Nonempty.card_ne_zero⟩ := card_ne_zero #align finset.nonempty.card_pos Finset.Nonempty.card_pos theorem card_ne_zero_of_mem (h : a ∈ s) : s.card ≠ 0 := (not_congr card_eq_zero).2 <\| ne_empty_of_mem h #align finset.card_ne_zero_of_mem Finset.card_ne_zero_of_mem @[simp] theorem card_singleton (a : α) : card ({a} : Finset α) = 1 := Multiset.card_singleton _ #align finset.card_singleton Finset.card_singleton theorem card_singleton_inter [DecidableEq α] : ({a} ∩ s).card ≤ 1 := by cases' Finset.decidableMem a s with h h · simp [Finset.singleton_inter_of_not_mem h] · simp [Finset.singleton_inter_of_mem h] #align finset.card_singleton_inter Finset.card_singleton_inter @[simp] theorem card_cons (h : a ∉ s) : (s.cons a h).card = s.card + 1 := Multiset.card_cons _ _ #align finset.card_cons Finset.card_cons section InsertErase variable [DecidableEq α] @[simp] theorem card_insert_of_not_mem (h : a ∉ s) : (insert a s).card = s.card + 1 := by rw [← cons_eq_insert _ _ h, card_cons] #align finset.card_insert_of_not_mem Finset.card_insert_of_not_mem theorem card_insert_of_mem (h : a ∈ s) : card (insert a s) = s.card := by rw [insert_eq_of_mem h] #align finset.card_insert_of_mem Finset.card_insert_of_mem theorem card_insert_le (a : α) (s : Finset α) : card (insert a s) ≤ s.card + 1 := by by_cases h : a ∈ s · rw [insert_eq_of_mem h] exact Nat.le_succ _ · rw [card_insert_of_not_mem h] #align finset.card_insert_le Finset.card_insert_le section variable {a b c d e f : α} theorem card_le_two : card {a, b} ≤ 2 := card_insert_le _ _ theorem card_le_three : card {a, b, c} ≤ 3 := (card_insert_le _ _).trans (Nat.succ_le_succ card_le_two) theorem card_le_four : card {a, b, c, d} ≤ 4 := (card_insert_le _ _).trans (Nat.succ_le_succ card_le_three) theorem card_le_five : card {a, b, c, d, e} ≤ 5 := (card_insert_le _ _).trans (Nat.succ_le_succ card_le_four) theorem card_le_six : card {a, b, c, d, e, f} ≤ 6 := (card_insert_le _ _).trans (Nat.succ_le_succ card_le_five) end theorem card_insert_eq_ite : card (insert a s) = if a ∈ s then s.card else s.card + 1 := by by_cases h : a ∈ s · rw [card_insert_of_mem h, if_pos h] · rw [card_insert_of_not_mem h, if_neg h] #align finset.card_insert_eq_ite Finset.card_insert_eq_ite @[simp]	Mathlib/Data/Finset/Card.lean	150	152	theorem card_pair_eq_one_or_two : ({a,b} : Finset α).card = 1 ∨ ({a,b} : Finset α).card = 2 := by	simp [card_insert_eq_ite] tauto
import Batteries.Control.ForInStep.Lemmas import Batteries.Data.List.Basic import Batteries.Tactic.Init import Batteries.Tactic.Alias namespace List open Nat @[simp] theorem mem_toArray {a : α} {l : List α} : a ∈ l.toArray ↔ a ∈ l := by simp [Array.mem_def] @[simp] theorem drop_one : ∀ l : List α, drop 1 l = tail l \| [] \| _ :: _ => rfl theorem zipWith_distrib_tail : (zipWith f l l').tail = zipWith f l.tail l'.tail := by rw [← drop_one]; simp [zipWith_distrib_drop] theorem subset_def {l₁ l₂ : List α} : l₁ ⊆ l₂ ↔ ∀ {a : α}, a ∈ l₁ → a ∈ l₂ := .rfl @[simp] theorem nil_subset (l : List α) : [] ⊆ l := nofun @[simp] theorem Subset.refl (l : List α) : l ⊆ l := fun _ i => i theorem Subset.trans {l₁ l₂ l₃ : List α} (h₁ : l₁ ⊆ l₂) (h₂ : l₂ ⊆ l₃) : l₁ ⊆ l₃ := fun _ i => h₂ (h₁ i) instance : Trans (Membership.mem : α → List α → Prop) Subset Membership.mem := ⟨fun h₁ h₂ => h₂ h₁⟩ instance : Trans (Subset : List α → List α → Prop) Subset Subset := ⟨Subset.trans⟩ @[simp] theorem subset_cons (a : α) (l : List α) : l ⊆ a :: l := fun _ => Mem.tail _ theorem subset_of_cons_subset {a : α} {l₁ l₂ : List α} : a :: l₁ ⊆ l₂ → l₁ ⊆ l₂ := fun s _ i => s (mem_cons_of_mem _ i) theorem subset_cons_of_subset (a : α) {l₁ l₂ : List α} : l₁ ⊆ l₂ → l₁ ⊆ a :: l₂ := fun s _ i => .tail _ (s i) theorem cons_subset_cons {l₁ l₂ : List α} (a : α) (s : l₁ ⊆ l₂) : a :: l₁ ⊆ a :: l₂ := fun _ => by simp only [mem_cons]; exact Or.imp_right (@s _) @[simp] theorem subset_append_left (l₁ l₂ : List α) : l₁ ⊆ l₁ ++ l₂ := fun _ => mem_append_left _ @[simp] theorem subset_append_right (l₁ l₂ : List α) : l₂ ⊆ l₁ ++ l₂ := fun _ => mem_append_right _ theorem subset_append_of_subset_left (l₂ : List α) : l ⊆ l₁ → l ⊆ l₁ ++ l₂ := fun s => Subset.trans s <\| subset_append_left _ _ theorem subset_append_of_subset_right (l₁ : List α) : l ⊆ l₂ → l ⊆ l₁ ++ l₂ := fun s => Subset.trans s <\| subset_append_right _ _ @[simp] theorem cons_subset : a :: l ⊆ m ↔ a ∈ m ∧ l ⊆ m := by simp only [subset_def, mem_cons, or_imp, forall_and, forall_eq] @[simp] theorem append_subset {l₁ l₂ l : List α} : l₁ ++ l₂ ⊆ l ↔ l₁ ⊆ l ∧ l₂ ⊆ l := by simp [subset_def, or_imp, forall_and] theorem subset_nil {l : List α} : l ⊆ [] ↔ l = [] := ⟨fun h => match l with \| [] => rfl \| _::_ => (nomatch h (.head ..)), fun \| rfl => Subset.refl _⟩ theorem map_subset {l₁ l₂ : List α} (f : α → β) (H : l₁ ⊆ l₂) : map f l₁ ⊆ map f l₂ := fun x => by simp only [mem_map]; exact .imp fun a => .imp_left (@H _) @[simp] theorem nil_sublist : ∀ l : List α, [] <+ l \| [] => .slnil \| a :: l => (nil_sublist l).cons a @[simp] theorem Sublist.refl : ∀ l : List α, l <+ l \| [] => .slnil \| a :: l => (Sublist.refl l).cons₂ a theorem Sublist.trans {l₁ l₂ l₃ : List α} (h₁ : l₁ <+ l₂) (h₂ : l₂ <+ l₃) : l₁ <+ l₃ := by induction h₂ generalizing l₁ with \| slnil => exact h₁ \| cons _ _ IH => exact (IH h₁).cons _ \| @cons₂ l₂ _ a _ IH => generalize e : a :: l₂ = l₂' match e ▸ h₁ with \| .slnil => apply nil_sublist \| .cons a' h₁' => cases e; apply (IH h₁').cons \| .cons₂ a' h₁' => cases e; apply (IH h₁').cons₂ instance : Trans (@Sublist α) Sublist Sublist := ⟨Sublist.trans⟩ @[simp] theorem sublist_cons (a : α) (l : List α) : l <+ a :: l := (Sublist.refl l).cons _ theorem sublist_of_cons_sublist : a :: l₁ <+ l₂ → l₁ <+ l₂ := (sublist_cons a l₁).trans @[simp] theorem sublist_append_left : ∀ l₁ l₂ : List α, l₁ <+ l₁ ++ l₂ \| [], _ => nil_sublist _ \| _ :: l₁, l₂ => (sublist_append_left l₁ l₂).cons₂ _ @[simp] theorem sublist_append_right : ∀ l₁ l₂ : List α, l₂ <+ l₁ ++ l₂ \| [], _ => Sublist.refl _ \| _ :: l₁, l₂ => (sublist_append_right l₁ l₂).cons _ theorem sublist_append_of_sublist_left (s : l <+ l₁) : l <+ l₁ ++ l₂ := s.trans <\| sublist_append_left .. theorem sublist_append_of_sublist_right (s : l <+ l₂) : l <+ l₁ ++ l₂ := s.trans <\| sublist_append_right .. @[simp] theorem cons_sublist_cons : a :: l₁ <+ a :: l₂ ↔ l₁ <+ l₂ := ⟨fun \| .cons _ s => sublist_of_cons_sublist s \| .cons₂ _ s => s, .cons₂ _⟩ @[simp] theorem append_sublist_append_left : ∀ l, l ++ l₁ <+ l ++ l₂ ↔ l₁ <+ l₂ \| [] => Iff.rfl \| _ :: l => cons_sublist_cons.trans (append_sublist_append_left l) theorem Sublist.append_left : l₁ <+ l₂ → ∀ l, l ++ l₁ <+ l ++ l₂ := fun h l => (append_sublist_append_left l).mpr h theorem Sublist.append_right : l₁ <+ l₂ → ∀ l, l₁ ++ l <+ l₂ ++ l \| .slnil, _ => Sublist.refl _ \| .cons _ h, _ => (h.append_right _).cons _ \| .cons₂ _ h, _ => (h.append_right _).cons₂ _	.lake/packages/batteries/Batteries/Data/List/Lemmas.lean	139	147	theorem sublist_or_mem_of_sublist (h : l <+ l₁ ++ a :: l₂) : l <+ l₁ ++ l₂ ∨ a ∈ l := by	induction l₁ generalizing l with \| nil => match h with \| .cons _ h => exact .inl h \| .cons₂ _ h => exact .inr (.head ..) \| cons b l₁ IH => match h with \| .cons _ h => exact (IH h).imp_left (Sublist.cons _) \| .cons₂ _ h => exact (IH h).imp (Sublist.cons₂ _) (.tail _)
import Mathlib.Algebra.Polynomial.Degree.Definitions import Mathlib.Algebra.Polynomial.Eval import Mathlib.Algebra.Polynomial.Monic import Mathlib.Algebra.Polynomial.RingDivision import Mathlib.Tactic.Abel #align_import ring_theory.polynomial.pochhammer from "leanprover-community/mathlib"@"53b216bcc1146df1c4a0a86877890ea9f1f01589" universe u v open Polynomial open Polynomial section Ring variable (R : Type u) [Ring R] noncomputable def descPochhammer : ℕ → R[X] \| 0 => 1 \| n + 1 => X * (descPochhammer n).comp (X - 1) @[simp] theorem descPochhammer_zero : descPochhammer R 0 = 1 := rfl @[simp] theorem descPochhammer_one : descPochhammer R 1 = X := by simp [descPochhammer] theorem descPochhammer_succ_left (n : ℕ) : descPochhammer R (n + 1) = X * (descPochhammer R n).comp (X - 1) := by rw [descPochhammer] theorem monic_descPochhammer (n : ℕ) [Nontrivial R] [NoZeroDivisors R] : Monic <\| descPochhammer R n := by induction' n with n hn · simp · have h : leadingCoeff (X - 1 : R[X]) = 1 := leadingCoeff_X_sub_C 1 have : natDegree (X - (1 : R[X])) ≠ 0 := ne_zero_of_eq_one <\| natDegree_X_sub_C (1 : R) rw [descPochhammer_succ_left, Monic.def, leadingCoeff_mul, leadingCoeff_comp this, hn, monic_X, one_mul, one_mul, h, one_pow] section variable {R} {T : Type v} [Ring T] @[simp] theorem descPochhammer_map (f : R →+* T) (n : ℕ) : (descPochhammer R n).map f = descPochhammer T n := by induction' n with n ih · simp · simp [ih, descPochhammer_succ_left, map_comp] end @[simp, norm_cast] theorem descPochhammer_eval_cast (n : ℕ) (k : ℤ) : (((descPochhammer ℤ n).eval k : ℤ) : R) = ((descPochhammer R n).eval k : R) := by rw [← descPochhammer_map (algebraMap ℤ R), eval_map, ← eq_intCast (algebraMap ℤ R)] simp only [algebraMap_int_eq, eq_intCast, eval₂_at_intCast, Nat.cast_id, eq_natCast, Int.cast_id] theorem descPochhammer_eval_zero {n : ℕ} : (descPochhammer R n).eval 0 = if n = 0 then 1 else 0 := by cases n · simp · simp [X_mul, Nat.succ_ne_zero, descPochhammer_succ_left] theorem descPochhammer_zero_eval_zero : (descPochhammer R 0).eval 0 = 1 := by simp @[simp] theorem descPochhammer_ne_zero_eval_zero {n : ℕ} (h : n ≠ 0) : (descPochhammer R n).eval 0 = 0 := by simp [descPochhammer_eval_zero, h] theorem descPochhammer_succ_right (n : ℕ) : descPochhammer R (n + 1) = descPochhammer R n * (X - (n : R[X])) := by suffices h : descPochhammer ℤ (n + 1) = descPochhammer ℤ n * (X - (n : ℤ[X])) by apply_fun Polynomial.map (algebraMap ℤ R) at h simpa [descPochhammer_map, Polynomial.map_mul, Polynomial.map_add, map_X, Polynomial.map_intCast] using h induction' n with n ih · simp [descPochhammer] · conv_lhs => rw [descPochhammer_succ_left, ih, mul_comp, ← mul_assoc, ← descPochhammer_succ_left, sub_comp, X_comp, natCast_comp] rw [Nat.cast_add, Nat.cast_one, sub_add_eq_sub_sub_swap] @[simp]	Mathlib/RingTheory/Polynomial/Pochhammer.lean	315	324	theorem descPochhammer_natDegree (n : ℕ) [NoZeroDivisors R] [Nontrivial R] : (descPochhammer R n).natDegree = n := by	induction' n with n hn · simp · have : natDegree (X - (n : R[X])) = 1 := natDegree_X_sub_C (n : R) rw [descPochhammer_succ_right, natDegree_mul _ (ne_zero_of_natDegree_gt <\| this.symm ▸ Nat.zero_lt_one), hn, this] cases n · simp · refine ne_zero_of_natDegree_gt <\| hn.symm ▸ Nat.add_one_pos _
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	Mathlib/MeasureTheory/OuterMeasure/AE.lean	107	109	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
import Mathlib.Topology.MetricSpace.ProperSpace import Mathlib.Topology.MetricSpace.Cauchy open Set Filter Bornology open scoped ENNReal Uniformity Topology Pointwise universe u v w variable {α : Type u} {β : Type v} {X ι : Type*} variable [PseudoMetricSpace α] namespace Metric #align metric.bounded Bornology.IsBounded section Bounded variable {x : α} {s t : Set α} {r : ℝ} #noalign metric.bounded_iff_is_bounded #align metric.bounded_empty Bornology.isBounded_empty #align metric.bounded_iff_mem_bounded Bornology.isBounded_iff_forall_mem #align metric.bounded.mono Bornology.IsBounded.subset theorem isBounded_closedBall : IsBounded (closedBall x r) := isBounded_iff.2 ⟨r + r, fun y hy z hz => calc dist y z ≤ dist y x + dist z x := dist_triangle_right _ _ _ _ ≤ r + r := add_le_add hy hz⟩ #align metric.bounded_closed_ball Metric.isBounded_closedBall theorem isBounded_ball : IsBounded (ball x r) := isBounded_closedBall.subset ball_subset_closedBall #align metric.bounded_ball Metric.isBounded_ball theorem isBounded_sphere : IsBounded (sphere x r) := isBounded_closedBall.subset sphere_subset_closedBall #align metric.bounded_sphere Metric.isBounded_sphere theorem isBounded_iff_subset_closedBall (c : α) : IsBounded s ↔ ∃ r, s ⊆ closedBall c r := ⟨fun h ↦ (isBounded_iff.1 (h.insert c)).imp fun _r hr _x hx ↦ hr (.inr hx) (mem_insert _ _), fun ⟨_r, hr⟩ ↦ isBounded_closedBall.subset hr⟩ #align metric.bounded_iff_subset_ball Metric.isBounded_iff_subset_closedBall theorem _root_.Bornology.IsBounded.subset_closedBall (h : IsBounded s) (c : α) : ∃ r, s ⊆ closedBall c r := (isBounded_iff_subset_closedBall c).1 h #align metric.bounded.subset_ball Bornology.IsBounded.subset_closedBall theorem _root_.Bornology.IsBounded.subset_ball_lt (h : IsBounded s) (a : ℝ) (c : α) : ∃ r, a < r ∧ s ⊆ ball c r := let ⟨r, hr⟩ := h.subset_closedBall c ⟨max r a + 1, (le_max_right _ _).trans_lt (lt_add_one _), hr.trans <\| closedBall_subset_ball <\| (le_max_left _ _).trans_lt (lt_add_one _)⟩ theorem _root_.Bornology.IsBounded.subset_ball (h : IsBounded s) (c : α) : ∃ r, s ⊆ ball c r := (h.subset_ball_lt 0 c).imp fun _ ↦ And.right theorem isBounded_iff_subset_ball (c : α) : IsBounded s ↔ ∃ r, s ⊆ ball c r := ⟨(IsBounded.subset_ball · c), fun ⟨_r, hr⟩ ↦ isBounded_ball.subset hr⟩ theorem _root_.Bornology.IsBounded.subset_closedBall_lt (h : IsBounded s) (a : ℝ) (c : α) : ∃ r, a < r ∧ s ⊆ closedBall c r := let ⟨r, har, hr⟩ := h.subset_ball_lt a c ⟨r, har, hr.trans ball_subset_closedBall⟩ #align metric.bounded.subset_ball_lt Bornology.IsBounded.subset_closedBall_lt theorem isBounded_closure_of_isBounded (h : IsBounded s) : IsBounded (closure s) := let ⟨C, h⟩ := isBounded_iff.1 h isBounded_iff.2 ⟨C, fun _a ha _b hb => isClosed_Iic.closure_subset <\| map_mem_closure₂ continuous_dist ha hb h⟩ #align metric.bounded_closure_of_bounded Metric.isBounded_closure_of_isBounded protected theorem _root_.Bornology.IsBounded.closure (h : IsBounded s) : IsBounded (closure s) := isBounded_closure_of_isBounded h #align metric.bounded.closure Bornology.IsBounded.closure @[simp] theorem isBounded_closure_iff : IsBounded (closure s) ↔ IsBounded s := ⟨fun h => h.subset subset_closure, fun h => h.closure⟩ #align metric.bounded_closure_iff Metric.isBounded_closure_iff #align metric.bounded_union Bornology.isBounded_union #align metric.bounded.union Bornology.IsBounded.union #align metric.bounded_bUnion Bornology.isBounded_biUnion #align metric.bounded.prod Bornology.IsBounded.prod theorem hasBasis_cobounded_compl_closedBall (c : α) : (cobounded α).HasBasis (fun _ ↦ True) (fun r ↦ (closedBall c r)ᶜ) := ⟨compl_surjective.forall.2 fun _ ↦ (isBounded_iff_subset_closedBall c).trans <\| by simp⟩ theorem hasBasis_cobounded_compl_ball (c : α) : (cobounded α).HasBasis (fun _ ↦ True) (fun r ↦ (ball c r)ᶜ) := ⟨compl_surjective.forall.2 fun _ ↦ (isBounded_iff_subset_ball c).trans <\| by simp⟩ @[simp] theorem comap_dist_right_atTop (c : α) : comap (dist · c) atTop = cobounded α := (atTop_basis.comap _).eq_of_same_basis <\| by simpa only [compl_def, mem_ball, not_lt] using hasBasis_cobounded_compl_ball c @[simp] theorem comap_dist_left_atTop (c : α) : comap (dist c) atTop = cobounded α := by simpa only [dist_comm _ c] using comap_dist_right_atTop c @[simp] theorem tendsto_dist_right_atTop_iff (c : α) {f : β → α} {l : Filter β} : Tendsto (fun x ↦ dist (f x) c) l atTop ↔ Tendsto f l (cobounded α) := by rw [← comap_dist_right_atTop c, tendsto_comap_iff, Function.comp_def] @[simp] theorem tendsto_dist_left_atTop_iff (c : α) {f : β → α} {l : Filter β} : Tendsto (fun x ↦ dist c (f x)) l atTop ↔ Tendsto f l (cobounded α) := by simp only [dist_comm c, tendsto_dist_right_atTop_iff] theorem tendsto_dist_right_cobounded_atTop (c : α) : Tendsto (dist · c) (cobounded α) atTop := tendsto_iff_comap.2 (comap_dist_right_atTop c).ge theorem tendsto_dist_left_cobounded_atTop (c : α) : Tendsto (dist c) (cobounded α) atTop := tendsto_iff_comap.2 (comap_dist_left_atTop c).ge theorem _root_.TotallyBounded.isBounded {s : Set α} (h : TotallyBounded s) : IsBounded s := -- We cover the totally bounded set by finitely many balls of radius 1, -- and then argue that a finite union of bounded sets is bounded let ⟨_t, fint, subs⟩ := (totallyBounded_iff.mp h) 1 zero_lt_one ((isBounded_biUnion fint).2 fun _ _ => isBounded_ball).subset subs #align totally_bounded.bounded TotallyBounded.isBounded theorem _root_.IsCompact.isBounded {s : Set α} (h : IsCompact s) : IsBounded s := -- A compact set is totally bounded, thus bounded h.totallyBounded.isBounded #align is_compact.bounded IsCompact.isBounded #align metric.bounded_of_finite Set.Finite.isBounded #align set.finite.bounded Set.Finite.isBounded #align metric.bounded_singleton Bornology.isBounded_singleton theorem cobounded_le_cocompact : cobounded α ≤ cocompact α := hasBasis_cocompact.ge_iff.2 fun _s hs ↦ hs.isBounded #align comap_dist_right_at_top_le_cocompact Metric.cobounded_le_cocompactₓ #align comap_dist_left_at_top_le_cocompact Metric.cobounded_le_cocompactₓ theorem isCobounded_iff_closedBall_compl_subset {s : Set α} (c : α) : IsCobounded s ↔ ∃ (r : ℝ), (Metric.closedBall c r)ᶜ ⊆ s := by rw [← isBounded_compl_iff, isBounded_iff_subset_closedBall c] apply exists_congr intro r rw [compl_subset_comm] theorem _root_.Bornology.IsCobounded.closedBall_compl_subset {s : Set α} (hs : IsCobounded s) (c : α) : ∃ (r : ℝ), (Metric.closedBall c r)ᶜ ⊆ s := (isCobounded_iff_closedBall_compl_subset c).mp hs theorem closedBall_compl_subset_of_mem_cocompact {s : Set α} (hs : s ∈ cocompact α) (c : α) : ∃ (r : ℝ), (Metric.closedBall c r)ᶜ ⊆ s := IsCobounded.closedBall_compl_subset (cobounded_le_cocompact hs) c	Mathlib/Topology/MetricSpace/Bounded.lean	190	194	theorem mem_cocompact_of_closedBall_compl_subset [ProperSpace α] (c : α) (h : ∃ r, (closedBall c r)ᶜ ⊆ s) : s ∈ cocompact α := by	rcases h with ⟨r, h⟩ rw [Filter.mem_cocompact] exact ⟨closedBall c r, isCompact_closedBall c r, h⟩
import Mathlib.Algebra.Order.Ring.WithTop import Mathlib.Algebra.Order.Sub.WithTop import Mathlib.Data.Real.NNReal import Mathlib.Order.Interval.Set.WithBotTop #align_import data.real.ennreal from "leanprover-community/mathlib"@"c14c8fcde993801fca8946b0d80131a1a81d1520" open Function Set NNReal variable {α : Type} def ENNReal := WithTop ℝ≥0 deriving Zero, AddCommMonoidWithOne, SemilatticeSup, DistribLattice, Nontrivial #align ennreal ENNReal @[inherit_doc] scoped[ENNReal] notation "ℝ≥0∞" => ENNReal scoped[ENNReal] notation "∞" => (⊤ : ENNReal) namespace ENNReal instance : OrderBot ℝ≥0∞ := inferInstanceAs (OrderBot (WithTop ℝ≥0)) instance : BoundedOrder ℝ≥0∞ := inferInstanceAs (BoundedOrder (WithTop ℝ≥0)) instance : CharZero ℝ≥0∞ := inferInstanceAs (CharZero (WithTop ℝ≥0)) noncomputable instance : CanonicallyOrderedCommSemiring ℝ≥0∞ := inferInstanceAs (CanonicallyOrderedCommSemiring (WithTop ℝ≥0)) noncomputable instance : CompleteLinearOrder ℝ≥0∞ := inferInstanceAs (CompleteLinearOrder (WithTop ℝ≥0)) instance : DenselyOrdered ℝ≥0∞ := inferInstanceAs (DenselyOrdered (WithTop ℝ≥0)) noncomputable instance : CanonicallyLinearOrderedAddCommMonoid ℝ≥0∞ := inferInstanceAs (CanonicallyLinearOrderedAddCommMonoid (WithTop ℝ≥0)) noncomputable instance instSub : Sub ℝ≥0∞ := inferInstanceAs (Sub (WithTop ℝ≥0)) noncomputable instance : OrderedSub ℝ≥0∞ := inferInstanceAs (OrderedSub (WithTop ℝ≥0)) noncomputable instance : LinearOrderedAddCommMonoidWithTop ℝ≥0∞ := inferInstanceAs (LinearOrderedAddCommMonoidWithTop (WithTop ℝ≥0)) -- Porting note: rfc: redefine using pattern matching? noncomputable instance : Inv ℝ≥0∞ := ⟨fun a => sInf { b \| 1 ≤ a b }⟩ noncomputable instance : DivInvMonoid ℝ≥0∞ where variable {a b c d : ℝ≥0∞} {r p q : ℝ≥0} -- Porting note: are these 2 instances still required in Lean 4? instance covariantClass_mul_le : CovariantClass ℝ≥0∞ ℝ≥0∞ (· * ·) (· ≤ ·) := inferInstance #align ennreal.covariant_class_mul_le ENNReal.covariantClass_mul_le instance covariantClass_add_le : CovariantClass ℝ≥0∞ ℝ≥0∞ (· + ·) (· ≤ ·) := inferInstance #align ennreal.covariant_class_add_le ENNReal.covariantClass_add_le -- Porting note (#11215): TODO: add a `WithTop` instance and use it here noncomputable instance : LinearOrderedCommMonoidWithZero ℝ≥0∞ := { inferInstanceAs (LinearOrderedAddCommMonoidWithTop ℝ≥0∞), inferInstanceAs (CommSemiring ℝ≥0∞) with mul_le_mul_left := fun _ _ => mul_le_mul_left' zero_le_one := zero_le 1 } noncomputable instance : Unique (AddUnits ℝ≥0∞) where default := 0 uniq a := AddUnits.ext <\| le_zero_iff.1 <\| by rw [← a.add_neg]; exact le_self_add instance : Inhabited ℝ≥0∞ := ⟨0⟩ @[coe, match_pattern] def ofNNReal : ℝ≥0 → ℝ≥0∞ := WithTop.some instance : Coe ℝ≥0 ℝ≥0∞ := ⟨ofNNReal⟩ @[elab_as_elim, induction_eliminator, cases_eliminator] def recTopCoe {C : ℝ≥0∞ → Sort} (top : C ∞) (coe : ∀ x : ℝ≥0, C x) (x : ℝ≥0∞) : C x := WithTop.recTopCoe top coe x instance canLift : CanLift ℝ≥0∞ ℝ≥0 ofNNReal (· ≠ ∞) := WithTop.canLift #align ennreal.can_lift ENNReal.canLift @[simp] theorem none_eq_top : (none : ℝ≥0∞) = ∞ := rfl #align ennreal.none_eq_top ENNReal.none_eq_top @[simp] theorem some_eq_coe (a : ℝ≥0) : (Option.some a : ℝ≥0∞) = (↑a : ℝ≥0∞) := rfl #align ennreal.some_eq_coe ENNReal.some_eq_coe @[simp] theorem some_eq_coe' (a : ℝ≥0) : (WithTop.some a : ℝ≥0∞) = (↑a : ℝ≥0∞) := rfl lemma coe_injective : Injective ((↑) : ℝ≥0 → ℝ≥0∞) := WithTop.coe_injective @[simp, norm_cast] lemma coe_inj : (p : ℝ≥0∞) = q ↔ p = q := coe_injective.eq_iff #align ennreal.coe_eq_coe ENNReal.coe_inj lemma coe_ne_coe : (p : ℝ≥0∞) ≠ q ↔ p ≠ q := coe_inj.not theorem range_coe' : range ofNNReal = Iio ∞ := WithTop.range_coe theorem range_coe : range ofNNReal = {∞}ᶜ := (isCompl_range_some_none ℝ≥0).symm.compl_eq.symm protected def toNNReal : ℝ≥0∞ → ℝ≥0 := WithTop.untop' 0 #align ennreal.to_nnreal ENNReal.toNNReal protected def toReal (a : ℝ≥0∞) : Real := a.toNNReal #align ennreal.to_real ENNReal.toReal protected noncomputable def ofReal (r : Real) : ℝ≥0∞ := r.toNNReal #align ennreal.of_real ENNReal.ofReal @[simp, norm_cast] theorem toNNReal_coe : (r : ℝ≥0∞).toNNReal = r := rfl #align ennreal.to_nnreal_coe ENNReal.toNNReal_coe @[simp] theorem coe_toNNReal : ∀ {a : ℝ≥0∞}, a ≠ ∞ → ↑a.toNNReal = a \| ofNNReal _, _ => rfl \| ⊤, h => (h rfl).elim #align ennreal.coe_to_nnreal ENNReal.coe_toNNReal @[simp] theorem ofReal_toReal {a : ℝ≥0∞} (h : a ≠ ∞) : ENNReal.ofReal a.toReal = a := by simp [ENNReal.toReal, ENNReal.ofReal, h] #align ennreal.of_real_to_real ENNReal.ofReal_toReal @[simp] theorem toReal_ofReal {r : ℝ} (h : 0 ≤ r) : (ENNReal.ofReal r).toReal = r := max_eq_left h #align ennreal.to_real_of_real ENNReal.toReal_ofReal theorem toReal_ofReal' {r : ℝ} : (ENNReal.ofReal r).toReal = max r 0 := rfl #align ennreal.to_real_of_real' ENNReal.toReal_ofReal' theorem coe_toNNReal_le_self : ∀ {a : ℝ≥0∞}, ↑a.toNNReal ≤ a \| ofNNReal r => by rw [toNNReal_coe] \| ⊤ => le_top #align ennreal.coe_to_nnreal_le_self ENNReal.coe_toNNReal_le_self theorem coe_nnreal_eq (r : ℝ≥0) : (r : ℝ≥0∞) = ENNReal.ofReal r := by rw [ENNReal.ofReal, Real.toNNReal_coe] #align ennreal.coe_nnreal_eq ENNReal.coe_nnreal_eq theorem ofReal_eq_coe_nnreal {x : ℝ} (h : 0 ≤ x) : ENNReal.ofReal x = ofNNReal ⟨x, h⟩ := (coe_nnreal_eq ⟨x, h⟩).symm #align ennreal.of_real_eq_coe_nnreal ENNReal.ofReal_eq_coe_nnreal @[simp] theorem ofReal_coe_nnreal : ENNReal.ofReal p = p := (coe_nnreal_eq p).symm #align ennreal.of_real_coe_nnreal ENNReal.ofReal_coe_nnreal @[simp, norm_cast] theorem coe_zero : ↑(0 : ℝ≥0) = (0 : ℝ≥0∞) := rfl #align ennreal.coe_zero ENNReal.coe_zero @[simp, norm_cast] theorem coe_one : ↑(1 : ℝ≥0) = (1 : ℝ≥0∞) := rfl #align ennreal.coe_one ENNReal.coe_one @[simp] theorem toReal_nonneg {a : ℝ≥0∞} : 0 ≤ a.toReal := a.toNNReal.2 #align ennreal.to_real_nonneg ENNReal.toReal_nonneg @[simp] theorem top_toNNReal : ∞.toNNReal = 0 := rfl #align ennreal.top_to_nnreal ENNReal.top_toNNReal @[simp] theorem top_toReal : ∞.toReal = 0 := rfl #align ennreal.top_to_real ENNReal.top_toReal @[simp] theorem one_toReal : (1 : ℝ≥0∞).toReal = 1 := rfl #align ennreal.one_to_real ENNReal.one_toReal @[simp] theorem one_toNNReal : (1 : ℝ≥0∞).toNNReal = 1 := rfl #align ennreal.one_to_nnreal ENNReal.one_toNNReal @[simp] theorem coe_toReal (r : ℝ≥0) : (r : ℝ≥0∞).toReal = r := rfl #align ennreal.coe_to_real ENNReal.coe_toReal @[simp] theorem zero_toNNReal : (0 : ℝ≥0∞).toNNReal = 0 := rfl #align ennreal.zero_to_nnreal ENNReal.zero_toNNReal @[simp] theorem zero_toReal : (0 : ℝ≥0∞).toReal = 0 := rfl #align ennreal.zero_to_real ENNReal.zero_toReal @[simp] theorem ofReal_zero : ENNReal.ofReal (0 : ℝ) = 0 := by simp [ENNReal.ofReal] #align ennreal.of_real_zero ENNReal.ofReal_zero @[simp] theorem ofReal_one : ENNReal.ofReal (1 : ℝ) = (1 : ℝ≥0∞) := by simp [ENNReal.ofReal] #align ennreal.of_real_one ENNReal.ofReal_one theorem ofReal_toReal_le {a : ℝ≥0∞} : ENNReal.ofReal a.toReal ≤ a := if ha : a = ∞ then ha.symm ▸ le_top else le_of_eq (ofReal_toReal ha) #align ennreal.of_real_to_real_le ENNReal.ofReal_toReal_le theorem forall_ennreal {p : ℝ≥0∞ → Prop} : (∀ a, p a) ↔ (∀ r : ℝ≥0, p r) ∧ p ∞ := Option.forall.trans and_comm #align ennreal.forall_ennreal ENNReal.forall_ennreal theorem forall_ne_top {p : ℝ≥0∞ → Prop} : (∀ a, a ≠ ∞ → p a) ↔ ∀ r : ℝ≥0, p r := Option.ball_ne_none #align ennreal.forall_ne_top ENNReal.forall_ne_top theorem exists_ne_top {p : ℝ≥0∞ → Prop} : (∃ a ≠ ∞, p a) ↔ ∃ r : ℝ≥0, p r := Option.exists_ne_none #align ennreal.exists_ne_top ENNReal.exists_ne_top theorem toNNReal_eq_zero_iff (x : ℝ≥0∞) : x.toNNReal = 0 ↔ x = 0 ∨ x = ∞ := WithTop.untop'_eq_self_iff #align ennreal.to_nnreal_eq_zero_iff ENNReal.toNNReal_eq_zero_iff theorem toReal_eq_zero_iff (x : ℝ≥0∞) : x.toReal = 0 ↔ x = 0 ∨ x = ∞ := by simp [ENNReal.toReal, toNNReal_eq_zero_iff] #align ennreal.to_real_eq_zero_iff ENNReal.toReal_eq_zero_iff theorem toNNReal_ne_zero : a.toNNReal ≠ 0 ↔ a ≠ 0 ∧ a ≠ ∞ := a.toNNReal_eq_zero_iff.not.trans not_or #align ennreal.to_nnreal_ne_zero ENNReal.toNNReal_ne_zero theorem toReal_ne_zero : a.toReal ≠ 0 ↔ a ≠ 0 ∧ a ≠ ∞ := a.toReal_eq_zero_iff.not.trans not_or #align ennreal.to_real_ne_zero ENNReal.toReal_ne_zero theorem toNNReal_eq_one_iff (x : ℝ≥0∞) : x.toNNReal = 1 ↔ x = 1 := WithTop.untop'_eq_iff.trans <\| by simp #align ennreal.to_nnreal_eq_one_iff ENNReal.toNNReal_eq_one_iff theorem toReal_eq_one_iff (x : ℝ≥0∞) : x.toReal = 1 ↔ x = 1 := by rw [ENNReal.toReal, NNReal.coe_eq_one, ENNReal.toNNReal_eq_one_iff] #align ennreal.to_real_eq_one_iff ENNReal.toReal_eq_one_iff theorem toNNReal_ne_one : a.toNNReal ≠ 1 ↔ a ≠ 1 := a.toNNReal_eq_one_iff.not #align ennreal.to_nnreal_ne_one ENNReal.toNNReal_ne_one theorem toReal_ne_one : a.toReal ≠ 1 ↔ a ≠ 1 := a.toReal_eq_one_iff.not #align ennreal.to_real_ne_one ENNReal.toReal_ne_one @[simp] theorem coe_ne_top : (r : ℝ≥0∞) ≠ ∞ := WithTop.coe_ne_top #align ennreal.coe_ne_top ENNReal.coe_ne_top @[simp] theorem top_ne_coe : ∞ ≠ (r : ℝ≥0∞) := WithTop.top_ne_coe #align ennreal.top_ne_coe ENNReal.top_ne_coe @[simp] theorem coe_lt_top : (r : ℝ≥0∞) < ∞ := WithTop.coe_lt_top r #align ennreal.coe_lt_top ENNReal.coe_lt_top @[simp] theorem ofReal_ne_top {r : ℝ} : ENNReal.ofReal r ≠ ∞ := coe_ne_top #align ennreal.of_real_ne_top ENNReal.ofReal_ne_top @[simp] theorem ofReal_lt_top {r : ℝ} : ENNReal.ofReal r < ∞ := coe_lt_top #align ennreal.of_real_lt_top ENNReal.ofReal_lt_top @[simp] theorem top_ne_ofReal {r : ℝ} : ∞ ≠ ENNReal.ofReal r := top_ne_coe #align ennreal.top_ne_of_real ENNReal.top_ne_ofReal @[simp] theorem ofReal_toReal_eq_iff : ENNReal.ofReal a.toReal = a ↔ a ≠ ⊤ := ⟨fun h => by rw [← h] exact ofReal_ne_top, ofReal_toReal⟩ #align ennreal.of_real_to_real_eq_iff ENNReal.ofReal_toReal_eq_iff @[simp] theorem toReal_ofReal_eq_iff {a : ℝ} : (ENNReal.ofReal a).toReal = a ↔ 0 ≤ a := ⟨fun h => by rw [← h] exact toReal_nonneg, toReal_ofReal⟩ #align ennreal.to_real_of_real_eq_iff ENNReal.toReal_ofReal_eq_iff @[simp] theorem zero_ne_top : 0 ≠ ∞ := coe_ne_top #align ennreal.zero_ne_top ENNReal.zero_ne_top @[simp] theorem top_ne_zero : ∞ ≠ 0 := top_ne_coe #align ennreal.top_ne_zero ENNReal.top_ne_zero @[simp] theorem one_ne_top : 1 ≠ ∞ := coe_ne_top #align ennreal.one_ne_top ENNReal.one_ne_top @[simp] theorem top_ne_one : ∞ ≠ 1 := top_ne_coe #align ennreal.top_ne_one ENNReal.top_ne_one @[simp] theorem zero_lt_top : 0 < ∞ := coe_lt_top @[simp, norm_cast] theorem coe_le_coe : (↑r : ℝ≥0∞) ≤ ↑q ↔ r ≤ q := WithTop.coe_le_coe #align ennreal.coe_le_coe ENNReal.coe_le_coe @[simp, norm_cast] theorem coe_lt_coe : (↑r : ℝ≥0∞) < ↑q ↔ r < q := WithTop.coe_lt_coe #align ennreal.coe_lt_coe ENNReal.coe_lt_coe -- Needed until `@[gcongr]` accepts iff statements alias ⟨_, coe_le_coe_of_le⟩ := coe_le_coe attribute [gcongr] ENNReal.coe_le_coe_of_le -- Needed until `@[gcongr]` accepts iff statements alias ⟨_, coe_lt_coe_of_lt⟩ := coe_lt_coe attribute [gcongr] ENNReal.coe_lt_coe_of_lt theorem coe_mono : Monotone ofNNReal := fun _ _ => coe_le_coe.2 #align ennreal.coe_mono ENNReal.coe_mono theorem coe_strictMono : StrictMono ofNNReal := fun _ _ => coe_lt_coe.2 @[simp, norm_cast] theorem coe_eq_zero : (↑r : ℝ≥0∞) = 0 ↔ r = 0 := coe_inj #align ennreal.coe_eq_zero ENNReal.coe_eq_zero @[simp, norm_cast] theorem zero_eq_coe : 0 = (↑r : ℝ≥0∞) ↔ 0 = r := coe_inj #align ennreal.zero_eq_coe ENNReal.zero_eq_coe @[simp, norm_cast] theorem coe_eq_one : (↑r : ℝ≥0∞) = 1 ↔ r = 1 := coe_inj #align ennreal.coe_eq_one ENNReal.coe_eq_one @[simp, norm_cast] theorem one_eq_coe : 1 = (↑r : ℝ≥0∞) ↔ 1 = r := coe_inj #align ennreal.one_eq_coe ENNReal.one_eq_coe @[simp, norm_cast] theorem coe_pos : 0 < (r : ℝ≥0∞) ↔ 0 < r := coe_lt_coe #align ennreal.coe_pos ENNReal.coe_pos theorem coe_ne_zero : (r : ℝ≥0∞) ≠ 0 ↔ r ≠ 0 := coe_eq_zero.not #align ennreal.coe_ne_zero ENNReal.coe_ne_zero lemma coe_ne_one : (r : ℝ≥0∞) ≠ 1 ↔ r ≠ 1 := coe_eq_one.not @[simp, norm_cast] lemma coe_add (x y : ℝ≥0) : (↑(x + y) : ℝ≥0∞) = x + y := rfl #align ennreal.coe_add ENNReal.coe_add @[simp, norm_cast] lemma coe_mul (x y : ℝ≥0) : (↑(x y) : ℝ≥0∞) = x * y := rfl #align ennreal.coe_mul ENNReal.coe_mul @[norm_cast] lemma coe_nsmul (n : ℕ) (x : ℝ≥0) : (↑(n • x) : ℝ≥0∞) = n • x := rfl @[simp, norm_cast] lemma coe_pow (x : ℝ≥0) (n : ℕ) : (↑(x ^ n) : ℝ≥0∞) = x ^ n := rfl #noalign ennreal.coe_bit0 #noalign ennreal.coe_bit1 -- See note [no_index around OfNat.ofNat] @[simp, norm_cast] -- Porting note (#10756): new theorem theorem coe_ofNat (n : ℕ) [n.AtLeastTwo] : ((no_index (OfNat.ofNat n) : ℝ≥0) : ℝ≥0∞) = OfNat.ofNat n := rfl -- Porting note (#11215): TODO: add lemmas about `OfNat.ofNat` and `<`/`≤` theorem coe_two : ((2 : ℝ≥0) : ℝ≥0∞) = 2 := rfl #align ennreal.coe_two ENNReal.coe_two theorem toNNReal_eq_toNNReal_iff (x y : ℝ≥0∞) : x.toNNReal = y.toNNReal ↔ x = y ∨ x = 0 ∧ y = ⊤ ∨ x = ⊤ ∧ y = 0 := WithTop.untop'_eq_untop'_iff #align ennreal.to_nnreal_eq_to_nnreal_iff ENNReal.toNNReal_eq_toNNReal_iff theorem toReal_eq_toReal_iff (x y : ℝ≥0∞) : x.toReal = y.toReal ↔ x = y ∨ x = 0 ∧ y = ⊤ ∨ x = ⊤ ∧ y = 0 := by simp only [ENNReal.toReal, NNReal.coe_inj, toNNReal_eq_toNNReal_iff] #align ennreal.to_real_eq_to_real_iff ENNReal.toReal_eq_toReal_iff theorem toNNReal_eq_toNNReal_iff' {x y : ℝ≥0∞} (hx : x ≠ ⊤) (hy : y ≠ ⊤) : x.toNNReal = y.toNNReal ↔ x = y := by simp only [ENNReal.toNNReal_eq_toNNReal_iff x y, hx, hy, and_false, false_and, or_false] #align ennreal.to_nnreal_eq_to_nnreal_iff' ENNReal.toNNReal_eq_toNNReal_iff' theorem toReal_eq_toReal_iff' {x y : ℝ≥0∞} (hx : x ≠ ⊤) (hy : y ≠ ⊤) : x.toReal = y.toReal ↔ x = y := by simp only [ENNReal.toReal, NNReal.coe_inj, toNNReal_eq_toNNReal_iff' hx hy] #align ennreal.to_real_eq_to_real_iff' ENNReal.toReal_eq_toReal_iff' theorem one_lt_two : (1 : ℝ≥0∞) < 2 := Nat.one_lt_ofNat #align ennreal.one_lt_two ENNReal.one_lt_two @[simp] theorem two_ne_top : (2 : ℝ≥0∞) ≠ ∞ := coe_ne_top #align ennreal.two_ne_top ENNReal.two_ne_top @[simp] theorem two_lt_top : (2 : ℝ≥0∞) < ∞ := coe_lt_top instance _root_.fact_one_le_one_ennreal : Fact ((1 : ℝ≥0∞) ≤ 1) := ⟨le_rfl⟩ #align fact_one_le_one_ennreal fact_one_le_one_ennreal instance _root_.fact_one_le_two_ennreal : Fact ((1 : ℝ≥0∞) ≤ 2) := ⟨one_le_two⟩ #align fact_one_le_two_ennreal fact_one_le_two_ennreal instance _root_.fact_one_le_top_ennreal : Fact ((1 : ℝ≥0∞) ≤ ∞) := ⟨le_top⟩ #align fact_one_le_top_ennreal fact_one_le_top_ennreal def neTopEquivNNReal : { a \| a ≠ ∞ } ≃ ℝ≥0 where toFun x := ENNReal.toNNReal x invFun x := ⟨x, coe_ne_top⟩ left_inv := fun x => Subtype.eq <\| coe_toNNReal x.2 right_inv _ := toNNReal_coe #align ennreal.ne_top_equiv_nnreal ENNReal.neTopEquivNNReal theorem cinfi_ne_top [InfSet α] (f : ℝ≥0∞ → α) : ⨅ x : { x // x ≠ ∞ }, f x = ⨅ x : ℝ≥0, f x := Eq.symm <\| neTopEquivNNReal.symm.surjective.iInf_congr _ fun _ => rfl #align ennreal.cinfi_ne_top ENNReal.cinfi_ne_top theorem iInf_ne_top [CompleteLattice α] (f : ℝ≥0∞ → α) : ⨅ (x) (_ : x ≠ ∞), f x = ⨅ x : ℝ≥0, f x := by rw [iInf_subtype', cinfi_ne_top] #align ennreal.infi_ne_top ENNReal.iInf_ne_top theorem csupr_ne_top [SupSet α] (f : ℝ≥0∞ → α) : ⨆ x : { x // x ≠ ∞ }, f x = ⨆ x : ℝ≥0, f x := @cinfi_ne_top αᵒᵈ _ _ #align ennreal.csupr_ne_top ENNReal.csupr_ne_top theorem iSup_ne_top [CompleteLattice α] (f : ℝ≥0∞ → α) : ⨆ (x) (_ : x ≠ ∞), f x = ⨆ x : ℝ≥0, f x := @iInf_ne_top αᵒᵈ _ _ #align ennreal.supr_ne_top ENNReal.iSup_ne_top theorem iInf_ennreal {α : Type} [CompleteLattice α] {f : ℝ≥0∞ → α} : ⨅ n, f n = (⨅ n : ℝ≥0, f n) ⊓ f ∞ := (iInf_option f).trans (inf_comm _ _) #align ennreal.infi_ennreal ENNReal.iInf_ennreal theorem iSup_ennreal {α : Type} [CompleteLattice α] {f : ℝ≥0∞ → α} : ⨆ n, f n = (⨆ n : ℝ≥0, f n) ⊔ f ∞ := @iInf_ennreal αᵒᵈ _ _ #align ennreal.supr_ennreal ENNReal.iSup_ennreal def ofNNRealHom : ℝ≥0 →+* ℝ≥0∞ where toFun := some map_one' := coe_one map_mul' _ _ := coe_mul _ _ map_zero' := coe_zero map_add' _ _ := coe_add _ _ #align ennreal.of_nnreal_hom ENNReal.ofNNRealHom @[simp] theorem coe_ofNNRealHom : ⇑ofNNRealHom = some := rfl #align ennreal.coe_of_nnreal_hom ENNReal.coe_ofNNRealHom @[simp, norm_cast] theorem coe_indicator {α} (s : Set α) (f : α → ℝ≥0) (a : α) : ((s.indicator f a : ℝ≥0) : ℝ≥0∞) = s.indicator (fun x => ↑(f x)) a := (ofNNRealHom : ℝ≥0 →+ ℝ≥0∞).map_indicator _ _ _ #align ennreal.coe_indicator ENNReal.coe_indicator section Order theorem bot_eq_zero : (⊥ : ℝ≥0∞) = 0 := rfl #align ennreal.bot_eq_zero ENNReal.bot_eq_zero -- `coe_lt_top` moved up theorem not_top_le_coe : ¬∞ ≤ ↑r := WithTop.not_top_le_coe r #align ennreal.not_top_le_coe ENNReal.not_top_le_coe @[simp, norm_cast] theorem one_le_coe_iff : (1 : ℝ≥0∞) ≤ ↑r ↔ 1 ≤ r := coe_le_coe #align ennreal.one_le_coe_iff ENNReal.one_le_coe_iff @[simp, norm_cast] theorem coe_le_one_iff : ↑r ≤ (1 : ℝ≥0∞) ↔ r ≤ 1 := coe_le_coe #align ennreal.coe_le_one_iff ENNReal.coe_le_one_iff @[simp, norm_cast] theorem coe_lt_one_iff : (↑p : ℝ≥0∞) < 1 ↔ p < 1 := coe_lt_coe #align ennreal.coe_lt_one_iff ENNReal.coe_lt_one_iff @[simp, norm_cast] theorem one_lt_coe_iff : 1 < (↑p : ℝ≥0∞) ↔ 1 < p := coe_lt_coe #align ennreal.one_lt_coe_iff ENNReal.one_lt_coe_iff @[simp, norm_cast] theorem coe_natCast (n : ℕ) : ((n : ℝ≥0) : ℝ≥0∞) = n := rfl #align ennreal.coe_nat ENNReal.coe_natCast @[simp, norm_cast] lemma ofReal_natCast (n : ℕ) : ENNReal.ofReal n = n := by simp [ENNReal.ofReal] #align ennreal.of_real_coe_nat ENNReal.ofReal_natCast -- See note [no_index around OfNat.ofNat] @[simp] theorem ofReal_ofNat (n : ℕ) [n.AtLeastTwo] : ENNReal.ofReal (no_index (OfNat.ofNat n)) = OfNat.ofNat n := ofReal_natCast n @[simp] theorem natCast_ne_top (n : ℕ) : (n : ℝ≥0∞) ≠ ∞ := WithTop.natCast_ne_top n #align ennreal.nat_ne_top ENNReal.natCast_ne_top @[simp] theorem top_ne_natCast (n : ℕ) : ∞ ≠ n := WithTop.top_ne_natCast n #align ennreal.top_ne_nat ENNReal.top_ne_natCast @[simp] theorem one_lt_top : 1 < ∞ := coe_lt_top #align ennreal.one_lt_top ENNReal.one_lt_top @[simp, norm_cast] theorem toNNReal_nat (n : ℕ) : (n : ℝ≥0∞).toNNReal = n := by rw [← ENNReal.coe_natCast n, ENNReal.toNNReal_coe] #align ennreal.to_nnreal_nat ENNReal.toNNReal_nat @[simp, norm_cast] theorem toReal_nat (n : ℕ) : (n : ℝ≥0∞).toReal = n := by rw [← ENNReal.ofReal_natCast n, ENNReal.toReal_ofReal (Nat.cast_nonneg _)] #align ennreal.to_real_nat ENNReal.toReal_nat -- See note [no_index around OfNat.ofNat] @[simp] theorem toReal_ofNat (n : ℕ) [n.AtLeastTwo] : ENNReal.toReal (no_index (OfNat.ofNat n)) = OfNat.ofNat n := toReal_nat n theorem le_coe_iff : a ≤ ↑r ↔ ∃ p : ℝ≥0, a = p ∧ p ≤ r := WithTop.le_coe_iff #align ennreal.le_coe_iff ENNReal.le_coe_iff theorem coe_le_iff : ↑r ≤ a ↔ ∀ p : ℝ≥0, a = p → r ≤ p := WithTop.coe_le_iff #align ennreal.coe_le_iff ENNReal.coe_le_iff theorem lt_iff_exists_coe : a < b ↔ ∃ p : ℝ≥0, a = p ∧ ↑p < b := WithTop.lt_iff_exists_coe #align ennreal.lt_iff_exists_coe ENNReal.lt_iff_exists_coe theorem toReal_le_coe_of_le_coe {a : ℝ≥0∞} {b : ℝ≥0} (h : a ≤ b) : a.toReal ≤ b := by lift a to ℝ≥0 using ne_top_of_le_ne_top coe_ne_top h simpa using h #align ennreal.to_real_le_coe_of_le_coe ENNReal.toReal_le_coe_of_le_coe @[simp, norm_cast] theorem coe_finset_sup {s : Finset α} {f : α → ℝ≥0} : ↑(s.sup f) = s.sup fun x => (f x : ℝ≥0∞) := Finset.comp_sup_eq_sup_comp_of_is_total _ coe_mono rfl #align ennreal.coe_finset_sup ENNReal.coe_finset_sup @[simp] theorem max_eq_zero_iff : max a b = 0 ↔ a = 0 ∧ b = 0 := max_eq_bot #align ennreal.max_eq_zero_iff ENNReal.max_eq_zero_iff theorem max_zero_left : max 0 a = a := max_eq_right (zero_le a) #align ennreal.max_zero_left ENNReal.max_zero_left theorem max_zero_right : max a 0 = a := max_eq_left (zero_le a) #align ennreal.max_zero_right ENNReal.max_zero_right @[simp] theorem sup_eq_max : a ⊔ b = max a b := rfl #align ennreal.sup_eq_max ENNReal.sup_eq_max -- Porting note: moved `le_of_forall_pos_le_add` down theorem lt_iff_exists_rat_btwn : a < b ↔ ∃ q : ℚ, 0 ≤ q ∧ a < Real.toNNReal q ∧ (Real.toNNReal q : ℝ≥0∞) < b := ⟨fun h => by rcases lt_iff_exists_coe.1 h with ⟨p, rfl, _⟩ rcases exists_between h with ⟨c, pc, cb⟩ rcases lt_iff_exists_coe.1 cb with ⟨r, rfl, _⟩ rcases (NNReal.lt_iff_exists_rat_btwn _ _).1 (coe_lt_coe.1 pc) with ⟨q, hq0, pq, qr⟩ exact ⟨q, hq0, coe_lt_coe.2 pq, lt_trans (coe_lt_coe.2 qr) cb⟩, fun ⟨q, _, qa, qb⟩ => lt_trans qa qb⟩ #align ennreal.lt_iff_exists_rat_btwn ENNReal.lt_iff_exists_rat_btwn theorem lt_iff_exists_real_btwn : a < b ↔ ∃ r : ℝ, 0 ≤ r ∧ a < ENNReal.ofReal r ∧ (ENNReal.ofReal r : ℝ≥0∞) < b := ⟨fun h => let ⟨q, q0, aq, qb⟩ := ENNReal.lt_iff_exists_rat_btwn.1 h ⟨q, Rat.cast_nonneg.2 q0, aq, qb⟩, fun ⟨_, _, qa, qb⟩ => lt_trans qa qb⟩ #align ennreal.lt_iff_exists_real_btwn ENNReal.lt_iff_exists_real_btwn theorem lt_iff_exists_nnreal_btwn : a < b ↔ ∃ r : ℝ≥0, a < r ∧ (r : ℝ≥0∞) < b := WithTop.lt_iff_exists_coe_btwn #align ennreal.lt_iff_exists_nnreal_btwn ENNReal.lt_iff_exists_nnreal_btwn theorem lt_iff_exists_add_pos_lt : a < b ↔ ∃ r : ℝ≥0, 0 < r ∧ a + r < b := by refine ⟨fun hab => ?_, fun ⟨r, _, hr⟩ => lt_of_le_of_lt le_self_add hr⟩ rcases lt_iff_exists_nnreal_btwn.1 hab with ⟨c, ac, cb⟩ lift a to ℝ≥0 using ac.ne_top rw [coe_lt_coe] at ac refine ⟨c - a, tsub_pos_iff_lt.2 ac, ?_⟩ rwa [← coe_add, add_tsub_cancel_of_le ac.le] #align ennreal.lt_iff_exists_add_pos_lt ENNReal.lt_iff_exists_add_pos_lt theorem le_of_forall_pos_le_add (h : ∀ ε : ℝ≥0, 0 < ε → b < ∞ → a ≤ b + ε) : a ≤ b := by contrapose! h rcases lt_iff_exists_add_pos_lt.1 h with ⟨r, hr0, hr⟩ exact ⟨r, hr0, h.trans_le le_top, hr⟩ #align ennreal.le_of_forall_pos_le_add ENNReal.le_of_forall_pos_le_add theorem natCast_lt_coe {n : ℕ} : n < (r : ℝ≥0∞) ↔ n < r := ENNReal.coe_natCast n ▸ coe_lt_coe #align ennreal.coe_nat_lt_coe ENNReal.natCast_lt_coe theorem coe_lt_natCast {n : ℕ} : (r : ℝ≥0∞) < n ↔ r < n := ENNReal.coe_natCast n ▸ coe_lt_coe #align ennreal.coe_lt_coe_nat ENNReal.coe_lt_natCast @[deprecated (since := "2024-04-05")] alias coe_nat := coe_natCast @[deprecated (since := "2024-04-05")] alias ofReal_coe_nat := ofReal_natCast @[deprecated (since := "2024-04-05")] alias nat_ne_top := natCast_ne_top @[deprecated (since := "2024-04-05")] alias top_ne_nat := top_ne_natCast @[deprecated (since := "2024-04-05")] alias coe_nat_lt_coe := natCast_lt_coe @[deprecated (since := "2024-04-05")] alias coe_lt_coe_nat := coe_lt_natCast protected theorem exists_nat_gt {r : ℝ≥0∞} (h : r ≠ ∞) : ∃ n : ℕ, r < n := by lift r to ℝ≥0 using h rcases exists_nat_gt r with ⟨n, hn⟩ exact ⟨n, coe_lt_natCast.2 hn⟩ #align ennreal.exists_nat_gt ENNReal.exists_nat_gt @[simp] theorem iUnion_Iio_coe_nat : ⋃ n : ℕ, Iio (n : ℝ≥0∞) = {∞}ᶜ := by ext x rw [mem_iUnion] exact ⟨fun ⟨n, hn⟩ => ne_top_of_lt hn, ENNReal.exists_nat_gt⟩ #align ennreal.Union_Iio_coe_nat ENNReal.iUnion_Iio_coe_nat @[simp] theorem iUnion_Iic_coe_nat : ⋃ n : ℕ, Iic (n : ℝ≥0∞) = {∞}ᶜ := Subset.antisymm (iUnion_subset fun n _x hx => ne_top_of_le_ne_top (natCast_ne_top n) hx) <\| iUnion_Iio_coe_nat ▸ iUnion_mono fun _ => Iio_subset_Iic_self #align ennreal.Union_Iic_coe_nat ENNReal.iUnion_Iic_coe_nat @[simp] theorem iUnion_Ioc_coe_nat : ⋃ n : ℕ, Ioc a n = Ioi a \ {∞} := by simp only [← Ioi_inter_Iic, ← inter_iUnion, iUnion_Iic_coe_nat, diff_eq] #align ennreal.Union_Ioc_coe_nat ENNReal.iUnion_Ioc_coe_nat @[simp] theorem iUnion_Ioo_coe_nat : ⋃ n : ℕ, Ioo a n = Ioi a \ {∞} := by simp only [← Ioi_inter_Iio, ← inter_iUnion, iUnion_Iio_coe_nat, diff_eq] #align ennreal.Union_Ioo_coe_nat ENNReal.iUnion_Ioo_coe_nat @[simp]	Mathlib/Data/ENNReal/Basic.lean	708	709	theorem iUnion_Icc_coe_nat : ⋃ n : ℕ, Icc a n = Ici a \ {∞} := by	simp only [← Ici_inter_Iic, ← inter_iUnion, iUnion_Iic_coe_nat, diff_eq]
import Mathlib.Order.ConditionallyCompleteLattice.Basic import Mathlib.Order.LatticeIntervals import Mathlib.Order.Interval.Set.OrdConnected #align_import order.complete_lattice_intervals from "leanprover-community/mathlib"@"207cfac9fcd06138865b5d04f7091e46d9320432" open scoped Classical open Set variable {ι : Sort} {α : Type} (s : Set α) section SupSet variable [Preorder α] [SupSet α] noncomputable def subsetSupSet [Inhabited s] : SupSet s where sSup t := if ht : t.Nonempty ∧ BddAbove t ∧ sSup ((↑) '' t : Set α) ∈ s then ⟨sSup ((↑) '' t : Set α), ht.2.2⟩ else default #align subset_has_Sup subsetSupSet attribute [local instance] subsetSupSet @[simp] theorem subset_sSup_def [Inhabited s] : @sSup s _ = fun t => if ht : t.Nonempty ∧ BddAbove t ∧ sSup ((↑) '' t : Set α) ∈ s then ⟨sSup ((↑) '' t : Set α), ht.2.2⟩ else default := rfl #align subset_Sup_def subset_sSup_def theorem subset_sSup_of_within [Inhabited s] {t : Set s} (h' : t.Nonempty) (h'' : BddAbove t) (h : sSup ((↑) '' t : Set α) ∈ s) : sSup ((↑) '' t : Set α) = (@sSup s _ t : α) := by simp [dif_pos, h, h', h''] #align subset_Sup_of_within subset_sSup_of_within	Mathlib/Order/CompleteLatticeIntervals.lean	62	64	theorem subset_sSup_emptyset [Inhabited s] : sSup (∅ : Set s) = default := by	simp [sSup]
import Mathlib.RingTheory.PrincipalIdealDomain #align_import ring_theory.ideal.basic from "leanprover-community/mathlib"@"dc6c365e751e34d100e80fe6e314c3c3e0fd2988" variable {R : Type} [CommRing R] namespace Ideal open Submodule variable (R) in def isPrincipalSubmonoid : Submonoid (Ideal R) where carrier := {I \| IsPrincipal I} mul_mem' := by rintro _ _ ⟨x, rfl⟩ ⟨y, rfl⟩ exact ⟨x y, Ideal.span_singleton_mul_span_singleton x y⟩ one_mem' := ⟨1, one_eq_span⟩ theorem mem_isPrincipalSubmonoid_iff {I : Ideal R} : I ∈ isPrincipalSubmonoid R ↔ IsPrincipal I := Iff.rfl theorem span_singleton_mem_isPrincipalSubmonoid (a : R) : span {a} ∈ isPrincipalSubmonoid R := mem_isPrincipalSubmonoid_iff.mpr ⟨a, rfl⟩ variable [IsDomain R] variable (R) in noncomputable def associatesEquivIsPrincipal : Associates R ≃ {I : Ideal R // IsPrincipal I} where toFun := Quotient.lift (fun x ↦ ⟨span {x}, x, rfl⟩) (fun _ _ _ ↦ by simpa [span_singleton_eq_span_singleton]) invFun I := Associates.mk I.2.generator left_inv := Quotient.ind fun _ ↦ by simpa using Ideal.span_singleton_eq_span_singleton.mp (@Ideal.span_singleton_generator _ _ _ ⟨_, rfl⟩) right_inv I := by simp only [Quotient.lift_mk, span_singleton_generator, Subtype.coe_eta] @[simp] theorem associatesEquivIsPrincipal_apply (x : R) : associatesEquivIsPrincipal R (Associates.mk x) = span {x} := rfl @[simp] theorem associatesEquivIsPrincipal_symm_apply {I : Ideal R} (hI : IsPrincipal I) : (associatesEquivIsPrincipal R).symm ⟨I, hI⟩ = Associates.mk hI.generator := rfl theorem associatesEquivIsPrincipal_mul (x y : Associates R) : (associatesEquivIsPrincipal R (x * y) : Ideal R) = (associatesEquivIsPrincipal R x) * (associatesEquivIsPrincipal R y) := by rw [← Associates.quot_out x, ← Associates.quot_out y] simp_rw [Associates.mk_mul_mk, ← Associates.quotient_mk_eq_mk, associatesEquivIsPrincipal_apply, span_singleton_mul_span_singleton] @[simp]	Mathlib/RingTheory/Ideal/IsPrincipal.lean	75	78	theorem associatesEquivIsPrincipal_map_zero : (associatesEquivIsPrincipal R 0 : Ideal R) = 0 := by	rw [← Associates.mk_zero, ← Associates.quotient_mk_eq_mk, associatesEquivIsPrincipal_apply, Set.singleton_zero, span_zero, zero_eq_bot]
import Mathlib.Analysis.NormedSpace.PiLp import Mathlib.Analysis.InnerProductSpace.PiL2 #align_import analysis.matrix from "leanprover-community/mathlib"@"46b633fd842bef9469441c0209906f6dddd2b4f5" noncomputable section open scoped NNReal Matrix namespace Matrix variable {R l m n α β : Type*} [Fintype l] [Fintype m] [Fintype n] section LinfLinf section SeminormedAddCommGroup variable [SeminormedAddCommGroup α] [SeminormedAddCommGroup β] protected def seminormedAddCommGroup : SeminormedAddCommGroup (Matrix m n α) := Pi.seminormedAddCommGroup #align matrix.seminormed_add_comm_group Matrix.seminormedAddCommGroup attribute [local instance] Matrix.seminormedAddCommGroup -- Porting note (#10756): new theorem (along with all the uses of this lemma below) theorem norm_def (A : Matrix m n α) : ‖A‖ = ‖fun i j => A i j‖ := rfl lemma norm_eq_sup_sup_nnnorm (A : Matrix m n α) : ‖A‖ = Finset.sup Finset.univ fun i ↦ Finset.sup Finset.univ fun j ↦ ‖A i j‖₊ := by simp_rw [Matrix.norm_def, Pi.norm_def, Pi.nnnorm_def] -- Porting note (#10756): new theorem (along with all the uses of this lemma below) theorem nnnorm_def (A : Matrix m n α) : ‖A‖₊ = ‖fun i j => A i j‖₊ := rfl	Mathlib/Analysis/Matrix.lean	90	91	theorem norm_le_iff {r : ℝ} (hr : 0 ≤ r) {A : Matrix m n α} : ‖A‖ ≤ r ↔ ∀ i j, ‖A i j‖ ≤ r := by	simp_rw [norm_def, pi_norm_le_iff_of_nonneg hr]
import Mathlib.LinearAlgebra.Quotient import Mathlib.Algebra.Category.ModuleCat.Basic #align_import algebra.category.Module.epi_mono from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a" universe v u open CategoryTheory namespace ModuleCat variable {R : Type u} [Ring R] {X Y : ModuleCat.{v} R} (f : X ⟶ Y) variable {M : Type v} [AddCommGroup M] [Module R M] theorem ker_eq_bot_of_mono [Mono f] : LinearMap.ker f = ⊥ := LinearMap.ker_eq_bot_of_cancel fun u v => (@cancel_mono _ _ _ _ _ f _ (↟u) (↟v)).1 set_option linter.uppercaseLean3 false in #align Module.ker_eq_bot_of_mono ModuleCat.ker_eq_bot_of_mono theorem range_eq_top_of_epi [Epi f] : LinearMap.range f = ⊤ := LinearMap.range_eq_top_of_cancel fun u v => (@cancel_epi _ _ _ _ _ f _ (↟u) (↟v)).1 set_option linter.uppercaseLean3 false in #align Module.range_eq_top_of_epi ModuleCat.range_eq_top_of_epi theorem mono_iff_ker_eq_bot : Mono f ↔ LinearMap.ker f = ⊥ := ⟨fun hf => ker_eq_bot_of_mono _, fun hf => ConcreteCategory.mono_of_injective _ <\| by convert LinearMap.ker_eq_bot.1 hf⟩ set_option linter.uppercaseLean3 false in #align Module.mono_iff_ker_eq_bot ModuleCat.mono_iff_ker_eq_bot	Mathlib/Algebra/Category/ModuleCat/EpiMono.lean	44	45	theorem mono_iff_injective : Mono f ↔ Function.Injective f := by	rw [mono_iff_ker_eq_bot, LinearMap.ker_eq_bot]
import Mathlib.NumberTheory.Padics.PadicIntegers import Mathlib.RingTheory.ZMod #align_import number_theory.padics.ring_homs from "leanprover-community/mathlib"@"565eb991e264d0db702722b4bde52ee5173c9950" noncomputable section open scoped Classical open Nat LocalRing Padic namespace PadicInt variable {p : ℕ} [hp_prime : Fact p.Prime] section lift open CauSeq PadicSeq variable {R : Type} [NonAssocSemiring R] (f : ∀ k : ℕ, R →+ ZMod (p ^ k)) (f_compat : ∀ (k1 k2) (hk : k1 ≤ k2), (ZMod.castHom (pow_dvd_pow p hk) _).comp (f k2) = f k1) def nthHom (r : R) : ℕ → ℤ := fun n => (f n r : ZMod (p ^ n)).val #align padic_int.nth_hom PadicInt.nthHom @[simp]	Mathlib/NumberTheory/Padics/RingHoms.lean	498	500	theorem nthHom_zero : nthHom f 0 = 0 := by	simp (config := { unfoldPartialApp := true }) [nthHom] rfl
import Mathlib.Algebra.Algebra.Subalgebra.Directed import Mathlib.FieldTheory.IntermediateField import Mathlib.FieldTheory.Separable import Mathlib.FieldTheory.SplittingField.IsSplittingField import Mathlib.RingTheory.TensorProduct.Basic #align_import field_theory.adjoin from "leanprover-community/mathlib"@"df76f43357840485b9d04ed5dee5ab115d420e87" set_option autoImplicit true open FiniteDimensional Polynomial open scoped Classical Polynomial namespace IntermediateField section AdjoinDef variable (F : Type) [Field F] {E : Type} [Field E] [Algebra F E] (S : Set E) -- Porting note: not adding `neg_mem'` causes an error. def adjoin : IntermediateField F E := { Subfield.closure (Set.range (algebraMap F E) ∪ S) with algebraMap_mem' := fun x => Subfield.subset_closure (Or.inl (Set.mem_range_self x)) } #align intermediate_field.adjoin IntermediateField.adjoin variable {S} theorem mem_adjoin_iff (x : E) : x ∈ adjoin F S ↔ ∃ r s : MvPolynomial S F, x = MvPolynomial.aeval Subtype.val r / MvPolynomial.aeval Subtype.val s := by simp only [adjoin, mem_mk, Subring.mem_toSubsemiring, Subfield.mem_toSubring, Subfield.mem_closure_iff, ← Algebra.adjoin_eq_ring_closure, Subalgebra.mem_toSubring, Algebra.adjoin_eq_range, AlgHom.mem_range, exists_exists_eq_and] tauto	Mathlib/FieldTheory/Adjoin.lean	62	67	theorem mem_adjoin_simple_iff {α : E} (x : E) : x ∈ adjoin F {α} ↔ ∃ r s : F[X], x = aeval α r / aeval α s := by	simp only [adjoin, mem_mk, Subring.mem_toSubsemiring, Subfield.mem_toSubring, Subfield.mem_closure_iff, ← Algebra.adjoin_eq_ring_closure, Subalgebra.mem_toSubring, Algebra.adjoin_singleton_eq_range_aeval, AlgHom.mem_range, exists_exists_eq_and] tauto
import Mathlib.GroupTheory.Coprod.Basic import Mathlib.GroupTheory.Complement open Monoid Coprod Multiplicative Subgroup Function def HNNExtension.con (G : Type) [Group G] (A B : Subgroup G) (φ : A ≃ B) : Con (G ∗ Multiplicative ℤ) := conGen (fun x y => ∃ (a : A), x = inr (ofAdd 1) * inl (a : G) ∧ y = inl (φ a : G) * inr (ofAdd 1)) def HNNExtension (G : Type) [Group G] (A B : Subgroup G) (φ : A ≃ B) : Type _ := (HNNExtension.con G A B φ).Quotient variable {G : Type} [Group G] {A B : Subgroup G} {φ : A ≃ B} {H : Type} [Group H] {M : Type} [Monoid M] instance : Group (HNNExtension G A B φ) := by delta HNNExtension; infer_instance namespace HNNExtension def of : G →* HNNExtension G A B φ := (HNNExtension.con G A B φ).mk'.comp inl def t : HNNExtension G A B φ := (HNNExtension.con G A B φ).mk'.comp inr (ofAdd 1) theorem t_mul_of (a : A) : t * (of (a : G) : HNNExtension G A B φ) = of (φ a : G) * t := (Con.eq _).2 <\| ConGen.Rel.of _ _ <\| ⟨a, by simp⟩ theorem of_mul_t (b : B) : (of (b : G) : HNNExtension G A B φ) * t = t * of (φ.symm b : G) := by rw [t_mul_of]; simp theorem equiv_eq_conj (a : A) : (of (φ a : G) : HNNExtension G A B φ) = t * of (a : G) * t⁻¹ := by rw [t_mul_of]; simp theorem equiv_symm_eq_conj (b : B) : (of (φ.symm b : G) : HNNExtension G A B φ) = t⁻¹ * of (b : G) * t := by rw [mul_assoc, of_mul_t]; simp theorem inv_t_mul_of (b : B) : t⁻¹ * (of (b : G) : HNNExtension G A B φ) = of (φ.symm b : G) * t⁻¹ := by rw [equiv_symm_eq_conj]; simp theorem of_mul_inv_t (a : A) : (of (a : G) : HNNExtension G A B φ) * t⁻¹ = t⁻¹ * of (φ a : G) := by rw [equiv_eq_conj]; simp [mul_assoc] def lift (f : G →* H) (x : H) (hx : ∀ a : A, x * f ↑a = f (φ a : G) * x) : HNNExtension G A B φ →* H := Con.lift _ (Coprod.lift f (zpowersHom H x)) (Con.conGen_le <\| by rintro _ _ ⟨a, rfl, rfl⟩ simp [hx]) @[simp] theorem lift_t (f : G →* H) (x : H) (hx : ∀ a : A, x * f ↑a = f (φ a : G) * x) : lift f x hx t = x := by delta HNNExtension; simp [lift, t] @[simp]	Mathlib/GroupTheory/HNNExtension.lean	102	104	theorem lift_of (f : G →* H) (x : H) (hx : ∀ a : A, x * f ↑a = f (φ a : G) * x) (g : G) : lift f x hx (of g) = f g := by	delta HNNExtension; simp [lift, of]
import Mathlib.Topology.Sheaves.Presheaf import Mathlib.CategoryTheory.Adjunction.FullyFaithful #align_import algebraic_geometry.presheafed_space from "leanprover-community/mathlib"@"d39590fc8728fbf6743249802486f8c91ffe07bc" open Opposite CategoryTheory CategoryTheory.Category CategoryTheory.Functor TopCat TopologicalSpace variable (C : Type) [Category C] -- Porting note: we used to have: -- local attribute [tidy] tactic.auto_cases_opens -- We would replace this by: -- attribute [local aesop safe cases (rule_sets := [CategoryTheory])] Opens -- although it doesn't appear to help in this file, in any case. -- Porting note: we used to have: -- local attribute [tidy] tactic.op_induction' -- A possible replacement would be: -- attribute [local aesop safe cases (rule_sets := [CategoryTheory])] Opposite -- but this would probably require https://github.com/JLimperg/aesop/issues/59 -- In any case, it doesn't seem necessary here. namespace AlgebraicGeometry -- Porting note: `PresheafSpace.{w} C` is the type of topological spaces in `Type w` equipped -- with a presheaf with values in `C`; then there is a total of three universe parameters -- in `PresheafSpace.{w, v, u} C`, where `C : Type u` and `Category.{v} C`. -- In mathlib3, some definitions in this file unnecessarily assumed `w=v`. This restriction -- has been removed. structure PresheafedSpace where carrier : TopCat protected presheaf : carrier.Presheaf C set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace AlgebraicGeometry.PresheafedSpace variable {C} namespace PresheafedSpace -- Porting note: using `Coe` here triggers an error, `CoeOut` seems an acceptable alternative instance coeCarrier : CoeOut (PresheafedSpace C) TopCat where coe X := X.carrier set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.coe_carrier AlgebraicGeometry.PresheafedSpace.coeCarrier attribute [coe] PresheafedSpace.carrier -- Porting note: we add this instance, as Lean does not reliably use the `CoeOut` instance above -- in downstream files. instance : CoeSort (PresheafedSpace C) Type where coe := fun X => X.carrier -- Porting note: the following lemma is removed because it is a syntactic tauto set_option linter.uppercaseLean3 false in #noalign algebraic_geometry.PresheafedSpace.as_coe -- Porting note: removed @[simp] as the `simpVarHead` linter complains -- @[simp] theorem mk_coe (carrier) (presheaf) : (({ carrier presheaf } : PresheafedSpace C) : TopCat) = carrier := rfl set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.mk_coe AlgebraicGeometry.PresheafedSpace.mk_coe instance (X : PresheafedSpace C) : TopologicalSpace X := X.carrier.str def const (X : TopCat) (Z : C) : PresheafedSpace C where carrier := X presheaf := (Functor.const _).obj Z set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.const AlgebraicGeometry.PresheafedSpace.const instance [Inhabited C] : Inhabited (PresheafedSpace C) := ⟨const (TopCat.of PEmpty) default⟩ structure Hom (X Y : PresheafedSpace C) where base : (X : TopCat) ⟶ (Y : TopCat) c : Y.presheaf ⟶ base _* X.presheaf set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.hom AlgebraicGeometry.PresheafedSpace.Hom -- Porting note: eventually, the ext lemma shall be applied to terms in `X ⟶ Y` -- rather than `Hom X Y`, this one was renamed `Hom.ext` instead of `ext`, -- and the more practical lemma `ext` is defined just after the definition -- of the `Category` instance @[ext] theorem Hom.ext {X Y : PresheafedSpace C} (α β : Hom X Y) (w : α.base = β.base) (h : α.c ≫ whiskerRight (eqToHom (by rw [w])) _ = β.c) : α = β := by rcases α with ⟨base, c⟩ rcases β with ⟨base', c'⟩ dsimp at w subst w dsimp at h erw [whiskerRight_id', comp_id] at h subst h rfl set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.ext AlgebraicGeometry.PresheafedSpace.Hom.ext -- TODO including `injections` would make tidy work earlier.	Mathlib/Geometry/RingedSpace/PresheafedSpace.lean	126	130	theorem hext {X Y : PresheafedSpace C} (α β : Hom X Y) (w : α.base = β.base) (h : HEq α.c β.c) : α = β := by	cases α cases β congr
import Mathlib.Analysis.SpecialFunctions.Integrals import Mathlib.Analysis.SumIntegralComparisons import Mathlib.NumberTheory.Harmonic.Defs theorem log_add_one_le_harmonic (n : ℕ) : Real.log ↑(n+1) ≤ harmonic n := by calc _ = ∫ x in (1:ℕ)..↑(n+1), x⁻¹ := ?_ _ ≤ ∑ d ∈ Finset.Icc 1 n, (d:ℝ)⁻¹ := ?_ _ = harmonic n := ?_ · rw [Nat.cast_one, integral_inv (by simp [(show ¬ (1 : ℝ) ≤ 0 by norm_num)]), div_one] · exact (inv_antitoneOn_Icc_right <\| by norm_num).integral_le_sum_Ico (Nat.le_add_left 1 n) · simp only [harmonic_eq_sum_Icc, Rat.cast_sum, Rat.cast_inv, Rat.cast_natCast] theorem harmonic_le_one_add_log (n : ℕ) : harmonic n ≤ 1 + Real.log n := by by_cases hn0 : n = 0 · simp [hn0] have hn : 1 ≤ n := Nat.one_le_iff_ne_zero.mpr hn0 simp_rw [harmonic_eq_sum_Icc, Rat.cast_sum, Rat.cast_inv, Rat.cast_natCast] rw [← Finset.sum_erase_add (Finset.Icc 1 n) _ (Finset.left_mem_Icc.mpr hn), add_comm, Nat.cast_one, inv_one] refine add_le_add_left ?_ 1 simp only [Nat.lt_one_iff, Finset.mem_Icc, Finset.Icc_erase_left] calc ∑ d ∈ .Ico 2 (n + 1), (d : ℝ)⁻¹ _ = ∑ d ∈ .Ico 2 (n + 1), (↑(d + 1) - 1)⁻¹ := ?_ _ ≤ ∫ x in (2).. ↑(n + 1), (x - 1)⁻¹ := ?_ _ = ∫ x in (1)..n, x⁻¹ := ?_ _ = Real.log ↑n := ?_ · simp_rw [Nat.cast_add, Nat.cast_one, add_sub_cancel_right] · exact @AntitoneOn.sum_le_integral_Ico 2 (n + 1) (fun x : ℝ ↦ (x - 1)⁻¹) (by linarith [hn]) <\| sub_inv_antitoneOn_Icc_right (by norm_num) · convert intervalIntegral.integral_comp_sub_right _ 1 · norm_num · simp only [Nat.cast_add, Nat.cast_one, add_sub_cancel_right] · convert integral_inv _ · rw [div_one] · simp only [Nat.one_le_cast, hn, Set.uIcc_of_le, Set.mem_Icc, Nat.cast_nonneg, and_true, not_le, zero_lt_one]	Mathlib/NumberTheory/Harmonic/Bounds.lean	52	62	theorem log_le_harmonic_floor (y : ℝ) (hy : 0 ≤ y) : Real.log y ≤ harmonic ⌊y⌋₊ := by	by_cases h0 : y = 0 · simp [h0] · calc _ ≤ Real.log ↑(Nat.floor y + 1) := ?_ _ ≤ _ := log_add_one_le_harmonic _ gcongr apply (Nat.le_ceil y).trans norm_cast exact Nat.ceil_le_floor_add_one y
import Mathlib.Analysis.SpecialFunctions.Exp import Mathlib.Data.Nat.Factorization.Basic import Mathlib.Analysis.NormedSpace.Real #align_import analysis.special_functions.log.basic from "leanprover-community/mathlib"@"f23a09ce6d3f367220dc3cecad6b7eb69eb01690" open Set Filter Function open Topology noncomputable section namespace Real variable {x y : ℝ} -- @[pp_nodot] -- Porting note: removed noncomputable def log (x : ℝ) : ℝ := if hx : x = 0 then 0 else expOrderIso.symm ⟨\|x\|, abs_pos.2 hx⟩ #align real.log Real.log theorem log_of_ne_zero (hx : x ≠ 0) : log x = expOrderIso.symm ⟨\|x\|, abs_pos.2 hx⟩ := dif_neg hx #align real.log_of_ne_zero Real.log_of_ne_zero theorem log_of_pos (hx : 0 < x) : log x = expOrderIso.symm ⟨x, hx⟩ := by rw [log_of_ne_zero hx.ne'] congr exact abs_of_pos hx #align real.log_of_pos Real.log_of_pos theorem exp_log_eq_abs (hx : x ≠ 0) : exp (log x) = \|x\| := by rw [log_of_ne_zero hx, ← coe_expOrderIso_apply, OrderIso.apply_symm_apply, Subtype.coe_mk] #align real.exp_log_eq_abs Real.exp_log_eq_abs theorem exp_log (hx : 0 < x) : exp (log x) = x := by rw [exp_log_eq_abs hx.ne'] exact abs_of_pos hx #align real.exp_log Real.exp_log theorem exp_log_of_neg (hx : x < 0) : exp (log x) = -x := by rw [exp_log_eq_abs (ne_of_lt hx)] exact abs_of_neg hx #align real.exp_log_of_neg Real.exp_log_of_neg theorem le_exp_log (x : ℝ) : x ≤ exp (log x) := by by_cases h_zero : x = 0 · rw [h_zero, log, dif_pos rfl, exp_zero] exact zero_le_one · rw [exp_log_eq_abs h_zero] exact le_abs_self _ #align real.le_exp_log Real.le_exp_log @[simp] theorem log_exp (x : ℝ) : log (exp x) = x := exp_injective <\| exp_log (exp_pos x) #align real.log_exp Real.log_exp theorem surjOn_log : SurjOn log (Ioi 0) univ := fun x _ => ⟨exp x, exp_pos x, log_exp x⟩ #align real.surj_on_log Real.surjOn_log theorem log_surjective : Surjective log := fun x => ⟨exp x, log_exp x⟩ #align real.log_surjective Real.log_surjective @[simp] theorem range_log : range log = univ := log_surjective.range_eq #align real.range_log Real.range_log @[simp] theorem log_zero : log 0 = 0 := dif_pos rfl #align real.log_zero Real.log_zero @[simp] theorem log_one : log 1 = 0 := exp_injective <\| by rw [exp_log zero_lt_one, exp_zero] #align real.log_one Real.log_one @[simp] theorem log_abs (x : ℝ) : log \|x\| = log x := by by_cases h : x = 0 · simp [h] · rw [← exp_eq_exp, exp_log_eq_abs h, exp_log_eq_abs (abs_pos.2 h).ne', abs_abs] #align real.log_abs Real.log_abs @[simp] theorem log_neg_eq_log (x : ℝ) : log (-x) = log x := by rw [← log_abs x, ← log_abs (-x), abs_neg] #align real.log_neg_eq_log Real.log_neg_eq_log theorem sinh_log {x : ℝ} (hx : 0 < x) : sinh (log x) = (x - x⁻¹) / 2 := by rw [sinh_eq, exp_neg, exp_log hx] #align real.sinh_log Real.sinh_log theorem cosh_log {x : ℝ} (hx : 0 < x) : cosh (log x) = (x + x⁻¹) / 2 := by rw [cosh_eq, exp_neg, exp_log hx] #align real.cosh_log Real.cosh_log theorem surjOn_log' : SurjOn log (Iio 0) univ := fun x _ => ⟨-exp x, neg_lt_zero.2 <\| exp_pos x, by rw [log_neg_eq_log, log_exp]⟩ #align real.surj_on_log' Real.surjOn_log' theorem log_mul (hx : x ≠ 0) (hy : y ≠ 0) : log (x * y) = log x + log y := exp_injective <\| by rw [exp_log_eq_abs (mul_ne_zero hx hy), exp_add, exp_log_eq_abs hx, exp_log_eq_abs hy, abs_mul] #align real.log_mul Real.log_mul theorem log_div (hx : x ≠ 0) (hy : y ≠ 0) : log (x / y) = log x - log y := exp_injective <\| by rw [exp_log_eq_abs (div_ne_zero hx hy), exp_sub, exp_log_eq_abs hx, exp_log_eq_abs hy, abs_div] #align real.log_div Real.log_div @[simp] theorem log_inv (x : ℝ) : log x⁻¹ = -log x := by by_cases hx : x = 0; · simp [hx] rw [← exp_eq_exp, exp_log_eq_abs (inv_ne_zero hx), exp_neg, exp_log_eq_abs hx, abs_inv] #align real.log_inv Real.log_inv theorem log_le_log_iff (h : 0 < x) (h₁ : 0 < y) : log x ≤ log y ↔ x ≤ y := by rw [← exp_le_exp, exp_log h, exp_log h₁] #align real.log_le_log Real.log_le_log_iff @[gcongr] lemma log_le_log (hx : 0 < x) (hxy : x ≤ y) : log x ≤ log y := (log_le_log_iff hx (hx.trans_le hxy)).2 hxy @[gcongr] theorem log_lt_log (hx : 0 < x) (h : x < y) : log x < log y := by rwa [← exp_lt_exp, exp_log hx, exp_log (lt_trans hx h)] #align real.log_lt_log Real.log_lt_log theorem log_lt_log_iff (hx : 0 < x) (hy : 0 < y) : log x < log y ↔ x < y := by rw [← exp_lt_exp, exp_log hx, exp_log hy] #align real.log_lt_log_iff Real.log_lt_log_iff theorem log_le_iff_le_exp (hx : 0 < x) : log x ≤ y ↔ x ≤ exp y := by rw [← exp_le_exp, exp_log hx] #align real.log_le_iff_le_exp Real.log_le_iff_le_exp theorem log_lt_iff_lt_exp (hx : 0 < x) : log x < y ↔ x < exp y := by rw [← exp_lt_exp, exp_log hx] #align real.log_lt_iff_lt_exp Real.log_lt_iff_lt_exp theorem le_log_iff_exp_le (hy : 0 < y) : x ≤ log y ↔ exp x ≤ y := by rw [← exp_le_exp, exp_log hy] #align real.le_log_iff_exp_le Real.le_log_iff_exp_le theorem lt_log_iff_exp_lt (hy : 0 < y) : x < log y ↔ exp x < y := by rw [← exp_lt_exp, exp_log hy] #align real.lt_log_iff_exp_lt Real.lt_log_iff_exp_lt theorem log_pos_iff (hx : 0 < x) : 0 < log x ↔ 1 < x := by rw [← log_one] exact log_lt_log_iff zero_lt_one hx #align real.log_pos_iff Real.log_pos_iff theorem log_pos (hx : 1 < x) : 0 < log x := (log_pos_iff (lt_trans zero_lt_one hx)).2 hx #align real.log_pos Real.log_pos theorem log_pos_of_lt_neg_one (hx : x < -1) : 0 < log x := by rw [← neg_neg x, log_neg_eq_log] have : 1 < -x := by linarith exact log_pos this theorem log_neg_iff (h : 0 < x) : log x < 0 ↔ x < 1 := by rw [← log_one] exact log_lt_log_iff h zero_lt_one #align real.log_neg_iff Real.log_neg_iff theorem log_neg (h0 : 0 < x) (h1 : x < 1) : log x < 0 := (log_neg_iff h0).2 h1 #align real.log_neg Real.log_neg theorem log_neg_of_lt_zero (h0 : x < 0) (h1 : -1 < x) : log x < 0 := by rw [← neg_neg x, log_neg_eq_log] have h0' : 0 < -x := by linarith have h1' : -x < 1 := by linarith exact log_neg h0' h1' theorem log_nonneg_iff (hx : 0 < x) : 0 ≤ log x ↔ 1 ≤ x := by rw [← not_lt, log_neg_iff hx, not_lt] #align real.log_nonneg_iff Real.log_nonneg_iff theorem log_nonneg (hx : 1 ≤ x) : 0 ≤ log x := (log_nonneg_iff (zero_lt_one.trans_le hx)).2 hx #align real.log_nonneg Real.log_nonneg theorem log_nonpos_iff (hx : 0 < x) : log x ≤ 0 ↔ x ≤ 1 := by rw [← not_lt, log_pos_iff hx, not_lt] #align real.log_nonpos_iff Real.log_nonpos_iff theorem log_nonpos_iff' (hx : 0 ≤ x) : log x ≤ 0 ↔ x ≤ 1 := by rcases hx.eq_or_lt with (rfl \| hx) · simp [le_refl, zero_le_one] exact log_nonpos_iff hx #align real.log_nonpos_iff' Real.log_nonpos_iff' theorem log_nonpos (hx : 0 ≤ x) (h'x : x ≤ 1) : log x ≤ 0 := (log_nonpos_iff' hx).2 h'x #align real.log_nonpos Real.log_nonpos theorem log_natCast_nonneg (n : ℕ) : 0 ≤ log n := by if hn : n = 0 then simp [hn] else have : (1 : ℝ) ≤ n := mod_cast Nat.one_le_of_lt <\| Nat.pos_of_ne_zero hn exact log_nonneg this @[deprecated (since := "2024-04-17")] alias log_nat_cast_nonneg := log_natCast_nonneg theorem log_neg_natCast_nonneg (n : ℕ) : 0 ≤ log (-n) := by rw [← log_neg_eq_log, neg_neg] exact log_natCast_nonneg _ @[deprecated (since := "2024-04-17")] alias log_neg_nat_cast_nonneg := log_neg_natCast_nonneg theorem log_intCast_nonneg (n : ℤ) : 0 ≤ log n := by cases lt_trichotomy 0 n with \| inl hn => have : (1 : ℝ) ≤ n := mod_cast hn exact log_nonneg this \| inr hn => cases hn with \| inl hn => simp [hn.symm] \| inr hn => have : (1 : ℝ) ≤ -n := by rw [← neg_zero, ← lt_neg] at hn; exact mod_cast hn rw [← log_neg_eq_log] exact log_nonneg this @[deprecated (since := "2024-04-17")] alias log_int_cast_nonneg := log_intCast_nonneg theorem strictMonoOn_log : StrictMonoOn log (Set.Ioi 0) := fun _ hx _ _ hxy => log_lt_log hx hxy #align real.strict_mono_on_log Real.strictMonoOn_log theorem strictAntiOn_log : StrictAntiOn log (Set.Iio 0) := by rintro x (hx : x < 0) y (hy : y < 0) hxy rw [← log_abs y, ← log_abs x] refine log_lt_log (abs_pos.2 hy.ne) ?_ rwa [abs_of_neg hy, abs_of_neg hx, neg_lt_neg_iff] #align real.strict_anti_on_log Real.strictAntiOn_log theorem log_injOn_pos : Set.InjOn log (Set.Ioi 0) := strictMonoOn_log.injOn #align real.log_inj_on_pos Real.log_injOn_pos theorem log_lt_sub_one_of_pos (hx1 : 0 < x) (hx2 : x ≠ 1) : log x < x - 1 := by have h : log x ≠ 0 := by rwa [← log_one, log_injOn_pos.ne_iff hx1] exact mem_Ioi.mpr zero_lt_one linarith [add_one_lt_exp h, exp_log hx1] #align real.log_lt_sub_one_of_pos Real.log_lt_sub_one_of_pos theorem eq_one_of_pos_of_log_eq_zero {x : ℝ} (h₁ : 0 < x) (h₂ : log x = 0) : x = 1 := log_injOn_pos (Set.mem_Ioi.2 h₁) (Set.mem_Ioi.2 zero_lt_one) (h₂.trans Real.log_one.symm) #align real.eq_one_of_pos_of_log_eq_zero Real.eq_one_of_pos_of_log_eq_zero theorem log_ne_zero_of_pos_of_ne_one {x : ℝ} (hx_pos : 0 < x) (hx : x ≠ 1) : log x ≠ 0 := mt (eq_one_of_pos_of_log_eq_zero hx_pos) hx #align real.log_ne_zero_of_pos_of_ne_one Real.log_ne_zero_of_pos_of_ne_one @[simp] theorem log_eq_zero {x : ℝ} : log x = 0 ↔ x = 0 ∨ x = 1 ∨ x = -1 := by constructor · intro h rcases lt_trichotomy x 0 with (x_lt_zero \| rfl \| x_gt_zero) · refine Or.inr (Or.inr (neg_eq_iff_eq_neg.mp ?_)) rw [← log_neg_eq_log x] at h exact eq_one_of_pos_of_log_eq_zero (neg_pos.mpr x_lt_zero) h · exact Or.inl rfl · exact Or.inr (Or.inl (eq_one_of_pos_of_log_eq_zero x_gt_zero h)) · rintro (rfl \| rfl \| rfl) <;> simp only [log_one, log_zero, log_neg_eq_log] #align real.log_eq_zero Real.log_eq_zero theorem log_ne_zero {x : ℝ} : log x ≠ 0 ↔ x ≠ 0 ∧ x ≠ 1 ∧ x ≠ -1 := by simpa only [not_or] using log_eq_zero.not #align real.log_ne_zero Real.log_ne_zero @[simp] theorem log_pow (x : ℝ) (n : ℕ) : log (x ^ n) = n * log x := by induction' n with n ih · simp rcases eq_or_ne x 0 with (rfl \| hx) · simp rw [pow_succ, log_mul (pow_ne_zero _ hx) hx, ih, Nat.cast_succ, add_mul, one_mul] #align real.log_pow Real.log_pow @[simp] theorem log_zpow (x : ℝ) (n : ℤ) : log (x ^ n) = n * log x := by induction n · rw [Int.ofNat_eq_coe, zpow_natCast, log_pow, Int.cast_natCast] rw [zpow_negSucc, log_inv, log_pow, Int.cast_negSucc, Nat.cast_add_one, neg_mul_eq_neg_mul] #align real.log_zpow Real.log_zpow theorem log_sqrt {x : ℝ} (hx : 0 ≤ x) : log (√x) = log x / 2 := by rw [eq_div_iff, mul_comm, ← Nat.cast_two, ← log_pow, sq_sqrt hx] exact two_ne_zero #align real.log_sqrt Real.log_sqrt theorem log_le_sub_one_of_pos {x : ℝ} (hx : 0 < x) : log x ≤ x - 1 := by rw [le_sub_iff_add_le] convert add_one_le_exp (log x) rw [exp_log hx] #align real.log_le_sub_one_of_pos Real.log_le_sub_one_of_pos	Mathlib/Analysis/SpecialFunctions/Log/Basic.lean	327	339	theorem abs_log_mul_self_lt (x : ℝ) (h1 : 0 < x) (h2 : x ≤ 1) : \|log x * x\| < 1 := by	have : 0 < 1 / x := by simpa only [one_div, inv_pos] using h1 replace := log_le_sub_one_of_pos this replace : log (1 / x) < 1 / x := by linarith rw [log_div one_ne_zero h1.ne', log_one, zero_sub, lt_div_iff h1] at this have aux : 0 ≤ -log x * x := by refine mul_nonneg ?_ h1.le rw [← log_inv] apply log_nonneg rw [← le_inv h1 zero_lt_one, inv_one] exact h2 rw [← abs_of_nonneg aux, neg_mul, abs_neg] at this exact this
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	Mathlib/MeasureTheory/Function/L1Space.lean	83	83	theorem lintegral_nnnorm_zero : (∫⁻ _ : α, ‖(0 : β)‖₊ ∂μ) = 0 := by	simp
import Mathlib.MeasureTheory.Measure.MeasureSpace open scoped ENNReal NNReal Topology open Set MeasureTheory Measure Filter MeasurableSpace ENNReal Function variable {R α β δ γ ι : Type*} namespace MeasureTheory variable {m0 : MeasurableSpace α} [MeasurableSpace β] [MeasurableSpace γ] variable {μ μ₁ μ₂ μ₃ ν ν' ν₁ ν₂ : Measure α} {s s' t : Set α} namespace Measure noncomputable def restrictₗ {m0 : MeasurableSpace α} (s : Set α) : Measure α →ₗ[ℝ≥0∞] Measure α := liftLinear (OuterMeasure.restrict s) fun μ s' hs' t => by suffices μ (s ∩ t) = μ (s ∩ t ∩ s') + μ ((s ∩ t) \ s') by simpa [← Set.inter_assoc, Set.inter_comm _ s, ← inter_diff_assoc] exact le_toOuterMeasure_caratheodory _ _ hs' _ #align measure_theory.measure.restrictₗ MeasureTheory.Measure.restrictₗ noncomputable def restrict {_m0 : MeasurableSpace α} (μ : Measure α) (s : Set α) : Measure α := restrictₗ s μ #align measure_theory.measure.restrict MeasureTheory.Measure.restrict @[simp] theorem restrictₗ_apply {_m0 : MeasurableSpace α} (s : Set α) (μ : Measure α) : restrictₗ s μ = μ.restrict s := rfl #align measure_theory.measure.restrictₗ_apply MeasureTheory.Measure.restrictₗ_apply theorem restrict_toOuterMeasure_eq_toOuterMeasure_restrict (h : MeasurableSet s) : (μ.restrict s).toOuterMeasure = OuterMeasure.restrict s μ.toOuterMeasure := by simp_rw [restrict, restrictₗ, liftLinear, LinearMap.coe_mk, AddHom.coe_mk, toMeasure_toOuterMeasure, OuterMeasure.restrict_trim h, μ.trimmed] #align measure_theory.measure.restrict_to_outer_measure_eq_to_outer_measure_restrict MeasureTheory.Measure.restrict_toOuterMeasure_eq_toOuterMeasure_restrict theorem restrict_apply₀ (ht : NullMeasurableSet t (μ.restrict s)) : μ.restrict s t = μ (t ∩ s) := by rw [← restrictₗ_apply, restrictₗ, liftLinear_apply₀ _ ht, OuterMeasure.restrict_apply, coe_toOuterMeasure] #align measure_theory.measure.restrict_apply₀ MeasureTheory.Measure.restrict_apply₀ @[simp] theorem restrict_apply (ht : MeasurableSet t) : μ.restrict s t = μ (t ∩ s) := restrict_apply₀ ht.nullMeasurableSet #align measure_theory.measure.restrict_apply MeasureTheory.Measure.restrict_apply theorem restrict_mono' {_m0 : MeasurableSpace α} ⦃s s' : Set α⦄ ⦃μ ν : Measure α⦄ (hs : s ≤ᵐ[μ] s') (hμν : μ ≤ ν) : μ.restrict s ≤ ν.restrict s' := Measure.le_iff.2 fun t ht => calc μ.restrict s t = μ (t ∩ s) := restrict_apply ht _ ≤ μ (t ∩ s') := (measure_mono_ae <\| hs.mono fun _x hx ⟨hxt, hxs⟩ => ⟨hxt, hx hxs⟩) _ ≤ ν (t ∩ s') := le_iff'.1 hμν (t ∩ s') _ = ν.restrict s' t := (restrict_apply ht).symm #align measure_theory.measure.restrict_mono' MeasureTheory.Measure.restrict_mono' @[mono] theorem restrict_mono {_m0 : MeasurableSpace α} ⦃s s' : Set α⦄ (hs : s ⊆ s') ⦃μ ν : Measure α⦄ (hμν : μ ≤ ν) : μ.restrict s ≤ ν.restrict s' := restrict_mono' (ae_of_all _ hs) hμν #align measure_theory.measure.restrict_mono MeasureTheory.Measure.restrict_mono theorem restrict_mono_ae (h : s ≤ᵐ[μ] t) : μ.restrict s ≤ μ.restrict t := restrict_mono' h (le_refl μ) #align measure_theory.measure.restrict_mono_ae MeasureTheory.Measure.restrict_mono_ae theorem restrict_congr_set (h : s =ᵐ[μ] t) : μ.restrict s = μ.restrict t := le_antisymm (restrict_mono_ae h.le) (restrict_mono_ae h.symm.le) #align measure_theory.measure.restrict_congr_set MeasureTheory.Measure.restrict_congr_set @[simp] theorem restrict_apply' (hs : MeasurableSet s) : μ.restrict s t = μ (t ∩ s) := by rw [← toOuterMeasure_apply, Measure.restrict_toOuterMeasure_eq_toOuterMeasure_restrict hs, OuterMeasure.restrict_apply s t _, toOuterMeasure_apply] #align measure_theory.measure.restrict_apply' MeasureTheory.Measure.restrict_apply' theorem restrict_apply₀' (hs : NullMeasurableSet s μ) : μ.restrict s t = μ (t ∩ s) := by rw [← restrict_congr_set hs.toMeasurable_ae_eq, restrict_apply' (measurableSet_toMeasurable _ _), measure_congr ((ae_eq_refl t).inter hs.toMeasurable_ae_eq)] #align measure_theory.measure.restrict_apply₀' MeasureTheory.Measure.restrict_apply₀' theorem restrict_le_self : μ.restrict s ≤ μ := Measure.le_iff.2 fun t ht => calc μ.restrict s t = μ (t ∩ s) := restrict_apply ht _ ≤ μ t := measure_mono inter_subset_left #align measure_theory.measure.restrict_le_self MeasureTheory.Measure.restrict_le_self variable (μ) theorem restrict_eq_self (h : s ⊆ t) : μ.restrict t s = μ s := (le_iff'.1 restrict_le_self s).antisymm <\| calc μ s ≤ μ (toMeasurable (μ.restrict t) s ∩ t) := measure_mono (subset_inter (subset_toMeasurable _ _) h) _ = μ.restrict t s := by rw [← restrict_apply (measurableSet_toMeasurable _ _), measure_toMeasurable] #align measure_theory.measure.restrict_eq_self MeasureTheory.Measure.restrict_eq_self @[simp] theorem restrict_apply_self (s : Set α) : (μ.restrict s) s = μ s := restrict_eq_self μ Subset.rfl #align measure_theory.measure.restrict_apply_self MeasureTheory.Measure.restrict_apply_self variable {μ} theorem restrict_apply_univ (s : Set α) : μ.restrict s univ = μ s := by rw [restrict_apply MeasurableSet.univ, Set.univ_inter] #align measure_theory.measure.restrict_apply_univ MeasureTheory.Measure.restrict_apply_univ theorem le_restrict_apply (s t : Set α) : μ (t ∩ s) ≤ μ.restrict s t := calc μ (t ∩ s) = μ.restrict s (t ∩ s) := (restrict_eq_self μ inter_subset_right).symm _ ≤ μ.restrict s t := measure_mono inter_subset_left #align measure_theory.measure.le_restrict_apply MeasureTheory.Measure.le_restrict_apply theorem restrict_apply_le (s t : Set α) : μ.restrict s t ≤ μ t := Measure.le_iff'.1 restrict_le_self _ theorem restrict_apply_superset (h : s ⊆ t) : μ.restrict s t = μ s := ((measure_mono (subset_univ _)).trans_eq <\| restrict_apply_univ _).antisymm ((restrict_apply_self μ s).symm.trans_le <\| measure_mono h) #align measure_theory.measure.restrict_apply_superset MeasureTheory.Measure.restrict_apply_superset @[simp] theorem restrict_add {_m0 : MeasurableSpace α} (μ ν : Measure α) (s : Set α) : (μ + ν).restrict s = μ.restrict s + ν.restrict s := (restrictₗ s).map_add μ ν #align measure_theory.measure.restrict_add MeasureTheory.Measure.restrict_add @[simp] theorem restrict_zero {_m0 : MeasurableSpace α} (s : Set α) : (0 : Measure α).restrict s = 0 := (restrictₗ s).map_zero #align measure_theory.measure.restrict_zero MeasureTheory.Measure.restrict_zero @[simp] theorem restrict_smul {_m0 : MeasurableSpace α} (c : ℝ≥0∞) (μ : Measure α) (s : Set α) : (c • μ).restrict s = c • μ.restrict s := (restrictₗ s).map_smul c μ #align measure_theory.measure.restrict_smul MeasureTheory.Measure.restrict_smul theorem restrict_restrict₀ (hs : NullMeasurableSet s (μ.restrict t)) : (μ.restrict t).restrict s = μ.restrict (s ∩ t) := ext fun u hu => by simp only [Set.inter_assoc, restrict_apply hu, restrict_apply₀ (hu.nullMeasurableSet.inter hs)] #align measure_theory.measure.restrict_restrict₀ MeasureTheory.Measure.restrict_restrict₀ @[simp] theorem restrict_restrict (hs : MeasurableSet s) : (μ.restrict t).restrict s = μ.restrict (s ∩ t) := restrict_restrict₀ hs.nullMeasurableSet #align measure_theory.measure.restrict_restrict MeasureTheory.Measure.restrict_restrict theorem restrict_restrict_of_subset (h : s ⊆ t) : (μ.restrict t).restrict s = μ.restrict s := by ext1 u hu rw [restrict_apply hu, restrict_apply hu, restrict_eq_self] exact inter_subset_right.trans h #align measure_theory.measure.restrict_restrict_of_subset MeasureTheory.Measure.restrict_restrict_of_subset theorem restrict_restrict₀' (ht : NullMeasurableSet t μ) : (μ.restrict t).restrict s = μ.restrict (s ∩ t) := ext fun u hu => by simp only [restrict_apply hu, restrict_apply₀' ht, inter_assoc] #align measure_theory.measure.restrict_restrict₀' MeasureTheory.Measure.restrict_restrict₀' theorem restrict_restrict' (ht : MeasurableSet t) : (μ.restrict t).restrict s = μ.restrict (s ∩ t) := restrict_restrict₀' ht.nullMeasurableSet #align measure_theory.measure.restrict_restrict' MeasureTheory.Measure.restrict_restrict' theorem restrict_comm (hs : MeasurableSet s) : (μ.restrict t).restrict s = (μ.restrict s).restrict t := by rw [restrict_restrict hs, restrict_restrict' hs, inter_comm] #align measure_theory.measure.restrict_comm MeasureTheory.Measure.restrict_comm theorem restrict_apply_eq_zero (ht : MeasurableSet t) : μ.restrict s t = 0 ↔ μ (t ∩ s) = 0 := by rw [restrict_apply ht] #align measure_theory.measure.restrict_apply_eq_zero MeasureTheory.Measure.restrict_apply_eq_zero theorem measure_inter_eq_zero_of_restrict (h : μ.restrict s t = 0) : μ (t ∩ s) = 0 := nonpos_iff_eq_zero.1 (h ▸ le_restrict_apply _ _) #align measure_theory.measure.measure_inter_eq_zero_of_restrict MeasureTheory.Measure.measure_inter_eq_zero_of_restrict theorem restrict_apply_eq_zero' (hs : MeasurableSet s) : μ.restrict s t = 0 ↔ μ (t ∩ s) = 0 := by rw [restrict_apply' hs] #align measure_theory.measure.restrict_apply_eq_zero' MeasureTheory.Measure.restrict_apply_eq_zero' @[simp] theorem restrict_eq_zero : μ.restrict s = 0 ↔ μ s = 0 := by rw [← measure_univ_eq_zero, restrict_apply_univ] #align measure_theory.measure.restrict_eq_zero MeasureTheory.Measure.restrict_eq_zero instance restrict.neZero [NeZero (μ s)] : NeZero (μ.restrict s) := ⟨mt restrict_eq_zero.mp <\| NeZero.ne _⟩ theorem restrict_zero_set {s : Set α} (h : μ s = 0) : μ.restrict s = 0 := restrict_eq_zero.2 h #align measure_theory.measure.restrict_zero_set MeasureTheory.Measure.restrict_zero_set @[simp] theorem restrict_empty : μ.restrict ∅ = 0 := restrict_zero_set measure_empty #align measure_theory.measure.restrict_empty MeasureTheory.Measure.restrict_empty @[simp] theorem restrict_univ : μ.restrict univ = μ := ext fun s hs => by simp [hs] #align measure_theory.measure.restrict_univ MeasureTheory.Measure.restrict_univ theorem restrict_inter_add_diff₀ (s : Set α) (ht : NullMeasurableSet t μ) : μ.restrict (s ∩ t) + μ.restrict (s \ t) = μ.restrict s := by ext1 u hu simp only [add_apply, restrict_apply hu, ← inter_assoc, diff_eq] exact measure_inter_add_diff₀ (u ∩ s) ht #align measure_theory.measure.restrict_inter_add_diff₀ MeasureTheory.Measure.restrict_inter_add_diff₀ theorem restrict_inter_add_diff (s : Set α) (ht : MeasurableSet t) : μ.restrict (s ∩ t) + μ.restrict (s \ t) = μ.restrict s := restrict_inter_add_diff₀ s ht.nullMeasurableSet #align measure_theory.measure.restrict_inter_add_diff MeasureTheory.Measure.restrict_inter_add_diff theorem restrict_union_add_inter₀ (s : Set α) (ht : NullMeasurableSet t μ) : μ.restrict (s ∪ t) + μ.restrict (s ∩ t) = μ.restrict s + μ.restrict t := by rw [← restrict_inter_add_diff₀ (s ∪ t) ht, union_inter_cancel_right, union_diff_right, ← restrict_inter_add_diff₀ s ht, add_comm, ← add_assoc, add_right_comm] #align measure_theory.measure.restrict_union_add_inter₀ MeasureTheory.Measure.restrict_union_add_inter₀ theorem restrict_union_add_inter (s : Set α) (ht : MeasurableSet t) : μ.restrict (s ∪ t) + μ.restrict (s ∩ t) = μ.restrict s + μ.restrict t := restrict_union_add_inter₀ s ht.nullMeasurableSet #align measure_theory.measure.restrict_union_add_inter MeasureTheory.Measure.restrict_union_add_inter	Mathlib/MeasureTheory/Measure/Restrict.lean	266	268	theorem restrict_union_add_inter' (hs : MeasurableSet s) (t : Set α) : μ.restrict (s ∪ t) + μ.restrict (s ∩ t) = μ.restrict s + μ.restrict t := by	simpa only [union_comm, inter_comm, add_comm] using restrict_union_add_inter t hs
import Mathlib.CategoryTheory.Abelian.Basic #align_import category_theory.idempotents.basic from "leanprover-community/mathlib"@"3a061790136d13594ec10c7c90d202335ac5d854" open CategoryTheory open CategoryTheory.Category open CategoryTheory.Limits open CategoryTheory.Preadditive open Opposite namespace CategoryTheory variable (C : Type*) [Category C] class IsIdempotentComplete : Prop where idempotents_split : ∀ (X : C) (p : X ⟶ X), p ≫ p = p → ∃ (Y : C) (i : Y ⟶ X) (e : X ⟶ Y), i ≫ e = 𝟙 Y ∧ e ≫ i = p #align category_theory.is_idempotent_complete CategoryTheory.IsIdempotentComplete namespace Idempotents theorem isIdempotentComplete_iff_hasEqualizer_of_id_and_idempotent : IsIdempotentComplete C ↔ ∀ (X : C) (p : X ⟶ X), p ≫ p = p → HasEqualizer (𝟙 X) p := by constructor · intro intro X p hp rcases IsIdempotentComplete.idempotents_split X p hp with ⟨Y, i, e, ⟨h₁, h₂⟩⟩ exact ⟨Nonempty.intro { cone := Fork.ofι i (show i ≫ 𝟙 X = i ≫ p by rw [comp_id, ← h₂, ← assoc, h₁, id_comp]) isLimit := by apply Fork.IsLimit.mk' intro s refine ⟨s.ι ≫ e, ?_⟩ constructor · erw [assoc, h₂, ← Limits.Fork.condition s, comp_id] · intro m hm rw [Fork.ι_ofι] at hm rw [← hm] simp only [← hm, assoc, h₁] exact (comp_id m).symm }⟩ · intro h refine ⟨?_⟩ intro X p hp haveI : HasEqualizer (𝟙 X) p := h X p hp refine ⟨equalizer (𝟙 X) p, equalizer.ι (𝟙 X) p, equalizer.lift p (show p ≫ 𝟙 X = p ≫ p by rw [hp, comp_id]), ?_, equalizer.lift_ι _ _⟩ ext simp only [assoc, limit.lift_π, Eq.ndrec, id_eq, eq_mpr_eq_cast, Fork.ofι_pt, Fork.ofι_π_app, id_comp] rw [← equalizer.condition, comp_id] #align category_theory.idempotents.is_idempotent_complete_iff_has_equalizer_of_id_and_idempotent CategoryTheory.Idempotents.isIdempotentComplete_iff_hasEqualizer_of_id_and_idempotent variable {C} theorem idem_of_id_sub_idem [Preadditive C] {X : C} (p : X ⟶ X) (hp : p ≫ p = p) : (𝟙 _ - p) ≫ (𝟙 _ - p) = 𝟙 _ - p := by simp only [comp_sub, sub_comp, id_comp, comp_id, hp, sub_self, sub_zero] #align category_theory.idempotents.idem_of_id_sub_idem CategoryTheory.Idempotents.idem_of_id_sub_idem variable (C)	Mathlib/CategoryTheory/Idempotents/Basic.lean	107	117	theorem isIdempotentComplete_iff_idempotents_have_kernels [Preadditive C] : IsIdempotentComplete C ↔ ∀ (X : C) (p : X ⟶ X), p ≫ p = p → HasKernel p := by	rw [isIdempotentComplete_iff_hasEqualizer_of_id_and_idempotent] constructor · intro h X p hp haveI : HasEqualizer (𝟙 X) (𝟙 X - p) := h X (𝟙 _ - p) (idem_of_id_sub_idem p hp) convert hasKernel_of_hasEqualizer (𝟙 X) (𝟙 X - p) rw [sub_sub_cancel] · intro h X p hp haveI : HasKernel (𝟙 _ - p) := h X (𝟙 _ - p) (idem_of_id_sub_idem p hp) apply Preadditive.hasEqualizer_of_hasKernel
import Mathlib.Data.Multiset.Bind import Mathlib.Control.Traversable.Lemmas import Mathlib.Control.Traversable.Instances #align_import data.multiset.functor from "leanprover-community/mathlib"@"1f0096e6caa61e9c849ec2adbd227e960e9dff58" universe u namespace Multiset open List instance functor : Functor Multiset where map := @map @[simp] theorem fmap_def {α' β'} {s : Multiset α'} (f : α' → β') : f <$> s = s.map f := rfl #align multiset.fmap_def Multiset.fmap_def instance : LawfulFunctor Multiset where id_map := by simp comp_map := by simp map_const {_ _} := rfl open LawfulTraversable CommApplicative variable {F : Type u → Type u} [Applicative F] [CommApplicative F] variable {α' β' : Type u} (f : α' → F β') def traverse : Multiset α' → F (Multiset β') := by refine Quotient.lift (Functor.map Coe.coe ∘ Traversable.traverse f) ?_ introv p; unfold Function.comp induction p with \| nil => rfl \| @cons x l₁ l₂ _ h => have : Multiset.cons <$> f x <> Coe.coe <$> Traversable.traverse f l₁ = Multiset.cons <$> f x <> Coe.coe <$> Traversable.traverse f l₂ := by rw [h] simpa [functor_norm] using this \| swap x y l => have : (fun a b (l : List β') ↦ (↑(a :: b :: l) : Multiset β')) <$> f y <> f x = (fun a b l ↦ ↑(a :: b :: l)) <$> f x <> f y := by rw [CommApplicative.commutative_map] congr funext a b l simpa [flip] using Perm.swap a b l simp [(· ∘ ·), this, functor_norm, Coe.coe] \| trans => simp [] #align multiset.traverse Multiset.traverse instance : Monad Multiset := { Multiset.functor with pure := fun x ↦ {x} bind := @bind } @[simp] theorem pure_def {α} : (pure : α → Multiset α) = singleton := rfl #align multiset.pure_def Multiset.pure_def @[simp] theorem bind_def {α β} : (· >>= ·) = @bind α β := rfl #align multiset.bind_def Multiset.bind_def instance : LawfulMonad Multiset := LawfulMonad.mk' (bind_pure_comp := fun _ _ ↦ by simp only [pure_def, bind_def, bind_singleton, fmap_def]) (id_map := fun _ ↦ by simp only [fmap_def, id_eq, map_id']) (pure_bind := fun _ _ ↦ by simp only [pure_def, bind_def, singleton_bind]) (bind_assoc := @bind_assoc) open Functor open Traversable LawfulTraversable @[simp] theorem lift_coe {α β : Type} (x : List α) (f : List α → β) (h : ∀ a b : List α, a ≈ b → f a = f b) : Quotient.lift f h (x : Multiset α) = f x := Quotient.lift_mk _ _ _ #align multiset.lift_coe Multiset.lift_coe @[simp]	Mathlib/Data/Multiset/Functor.lean	97	99	theorem map_comp_coe {α β} (h : α → β) : Functor.map h ∘ Coe.coe = (Coe.coe ∘ Functor.map h : List α → Multiset β) := by	funext; simp only [Function.comp_apply, Coe.coe, fmap_def, map_coe, List.map_eq_map]
import Mathlib.Analysis.Convex.Jensen import Mathlib.Analysis.Convex.SpecificFunctions.Basic import Mathlib.Analysis.SpecialFunctions.Pow.NNReal import Mathlib.Data.Real.ConjExponents #align_import analysis.mean_inequalities from "leanprover-community/mathlib"@"8f9fea08977f7e450770933ee6abb20733b47c92" universe u v open scoped Classical open Finset NNReal ENNReal set_option linter.uppercaseLean3 false noncomputable section variable {ι : Type u} (s : Finset ι) section GeomMeanLEArithMean namespace Real	Mathlib/Analysis/MeanInequalities.lean	113	134	theorem geom_mean_le_arith_mean_weighted (w z : ι → ℝ) (hw : ∀ i ∈ s, 0 ≤ w i) (hw' : ∑ i ∈ s, w i = 1) (hz : ∀ i ∈ s, 0 ≤ z i) : ∏ i ∈ s, z i ^ w i ≤ ∑ i ∈ s, w i * z i := by	-- If some number `z i` equals zero and has non-zero weight, then LHS is 0 and RHS is nonnegative. by_cases A : ∃ i ∈ s, z i = 0 ∧ w i ≠ 0 · rcases A with ⟨i, his, hzi, hwi⟩ rw [prod_eq_zero his] · exact sum_nonneg fun j hj => mul_nonneg (hw j hj) (hz j hj) · rw [hzi] exact zero_rpow hwi -- If all numbers `z i` with non-zero weight are positive, then we apply Jensen's inequality -- for `exp` and numbers `log (z i)` with weights `w i`. · simp only [not_exists, not_and, Ne, Classical.not_not] at A have := convexOn_exp.map_sum_le hw hw' fun i _ => Set.mem_univ <\| log (z i) simp only [exp_sum, (· ∘ ·), smul_eq_mul, mul_comm (w _) (log _)] at this convert this using 1 <;> [apply prod_congr rfl;apply sum_congr rfl] <;> intro i hi · cases' eq_or_lt_of_le (hz i hi) with hz hz · simp [A i hi hz.symm] · exact rpow_def_of_pos hz _ · cases' eq_or_lt_of_le (hz i hi) with hz hz · simp [A i hi hz.symm] · rw [exp_log hz]
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 _ _)	Mathlib/Data/List/Rotate.lean	256	257	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]
import Mathlib.Algebra.MonoidAlgebra.Degree import Mathlib.Algebra.Polynomial.Coeff import Mathlib.Algebra.Polynomial.Monomial import Mathlib.Data.Fintype.BigOperators import Mathlib.Data.Nat.WithBot import Mathlib.Data.Nat.Cast.WithTop import Mathlib.Data.Nat.SuccPred #align_import data.polynomial.degree.definitions from "leanprover-community/mathlib"@"808ea4ebfabeb599f21ec4ae87d6dc969597887f" -- Porting note: `Mathlib.Data.Nat.Cast.WithTop` should be imported for `Nat.cast_withBot`. set_option linter.uppercaseLean3 false noncomputable section open Finsupp Finset open Polynomial namespace Polynomial universe u v variable {R : Type u} {S : Type v} {a b c d : R} {n m : ℕ} section Semiring variable [Semiring R] {p q r : R[X]} def degree (p : R[X]) : WithBot ℕ := p.support.max #align polynomial.degree Polynomial.degree theorem supDegree_eq_degree (p : R[X]) : p.toFinsupp.supDegree WithBot.some = p.degree := max_eq_sup_coe theorem degree_lt_wf : WellFounded fun p q : R[X] => degree p < degree q := InvImage.wf degree wellFounded_lt #align polynomial.degree_lt_wf Polynomial.degree_lt_wf instance : WellFoundedRelation R[X] := ⟨_, degree_lt_wf⟩ def natDegree (p : R[X]) : ℕ := (degree p).unbot' 0 #align polynomial.nat_degree Polynomial.natDegree def leadingCoeff (p : R[X]) : R := coeff p (natDegree p) #align polynomial.leading_coeff Polynomial.leadingCoeff def Monic (p : R[X]) := leadingCoeff p = (1 : R) #align polynomial.monic Polynomial.Monic @[nontriviality] theorem monic_of_subsingleton [Subsingleton R] (p : R[X]) : Monic p := Subsingleton.elim _ _ #align polynomial.monic_of_subsingleton Polynomial.monic_of_subsingleton theorem Monic.def : Monic p ↔ leadingCoeff p = 1 := Iff.rfl #align polynomial.monic.def Polynomial.Monic.def instance Monic.decidable [DecidableEq R] : Decidable (Monic p) := by unfold Monic; infer_instance #align polynomial.monic.decidable Polynomial.Monic.decidable @[simp] theorem Monic.leadingCoeff {p : R[X]} (hp : p.Monic) : leadingCoeff p = 1 := hp #align polynomial.monic.leading_coeff Polynomial.Monic.leadingCoeff theorem Monic.coeff_natDegree {p : R[X]} (hp : p.Monic) : p.coeff p.natDegree = 1 := hp #align polynomial.monic.coeff_nat_degree Polynomial.Monic.coeff_natDegree @[simp] theorem degree_zero : degree (0 : R[X]) = ⊥ := rfl #align polynomial.degree_zero Polynomial.degree_zero @[simp] theorem natDegree_zero : natDegree (0 : R[X]) = 0 := rfl #align polynomial.nat_degree_zero Polynomial.natDegree_zero @[simp] theorem coeff_natDegree : coeff p (natDegree p) = leadingCoeff p := rfl #align polynomial.coeff_nat_degree Polynomial.coeff_natDegree @[simp] theorem degree_eq_bot : degree p = ⊥ ↔ p = 0 := ⟨fun h => support_eq_empty.1 (Finset.max_eq_bot.1 h), fun h => h.symm ▸ rfl⟩ #align polynomial.degree_eq_bot Polynomial.degree_eq_bot @[nontriviality]	Mathlib/Algebra/Polynomial/Degree/Definitions.lean	123	124	theorem degree_of_subsingleton [Subsingleton R] : degree p = ⊥ := by	rw [Subsingleton.elim p 0, degree_zero]
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] 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] #align measure_theory.with_densityᵥ_sub MeasureTheory.withDensityᵥ_sub theorem withDensityᵥ_sub' (hf : Integrable f μ) (hg : Integrable g μ) : (μ.withDensityᵥ fun x => f x - g x) = μ.withDensityᵥ f - μ.withDensityᵥ g := withDensityᵥ_sub hf hg #align measure_theory.with_densityᵥ_sub' MeasureTheory.withDensityᵥ_sub' @[simp] theorem withDensityᵥ_smul {𝕜 : Type} [NontriviallyNormedField 𝕜] [NormedSpace 𝕜 E] [SMulCommClass ℝ 𝕜 E] (f : α → E) (r : 𝕜) : μ.withDensityᵥ (r • f) = r • μ.withDensityᵥ f := by by_cases hf : Integrable f μ · ext1 i hi rw [withDensityᵥ_apply (hf.smul r) hi, VectorMeasure.smul_apply, withDensityᵥ_apply hf hi, ← integral_smul r f] rfl · by_cases hr : r = 0 · rw [hr, zero_smul, zero_smul, withDensityᵥ_zero] · rw [withDensityᵥ, withDensityᵥ, dif_neg hf, dif_neg, smul_zero] rwa [integrable_smul_iff hr f] #align measure_theory.with_densityᵥ_smul MeasureTheory.withDensityᵥ_smul theorem withDensityᵥ_smul' {𝕜 : Type} [NontriviallyNormedField 𝕜] [NormedSpace 𝕜 E] [SMulCommClass ℝ 𝕜 E] (f : α → E) (r : 𝕜) : (μ.withDensityᵥ fun x => r • f x) = r • μ.withDensityᵥ f := withDensityᵥ_smul f r #align measure_theory.with_densityᵥ_smul' MeasureTheory.withDensityᵥ_smul' theorem withDensityᵥ_smul_eq_withDensityᵥ_withDensity {f : α → ℝ≥0} {g : α → E} (hf : AEMeasurable f μ) (hfg : Integrable (f • g) μ) : μ.withDensityᵥ (f • g) = (μ.withDensity (fun x ↦ f x)).withDensityᵥ g := by ext s hs rw [withDensityᵥ_apply hfg hs, withDensityᵥ_apply ((integrable_withDensity_iff_integrable_smul₀ hf).mpr hfg) hs, setIntegral_withDensity_eq_setIntegral_smul₀ hf.restrict _ hs] rfl theorem withDensityᵥ_smul_eq_withDensityᵥ_withDensity' {f : α → ℝ≥0∞} {g : α → E} (hf : AEMeasurable f μ) (hflt : ∀ᵐ x ∂μ, f x < ∞) (hfg : Integrable (fun x ↦ (f x).toReal • g x) μ) : μ.withDensityᵥ (fun x ↦ (f x).toReal • g x) = (μ.withDensity f).withDensityᵥ g := by rw [← withDensity_congr_ae (coe_toNNReal_ae_eq hflt), ← withDensityᵥ_smul_eq_withDensityᵥ_withDensity hf.ennreal_toNNReal hfg] rfl	Mathlib/MeasureTheory/Measure/WithDensityVectorMeasure.lean	148	155	theorem Measure.withDensityᵥ_absolutelyContinuous (μ : Measure α) (f : α → ℝ) : μ.withDensityᵥ f ≪ᵥ μ.toENNRealVectorMeasure := by	by_cases hf : Integrable f μ · refine VectorMeasure.AbsolutelyContinuous.mk fun i hi₁ hi₂ => ?_ rw [toENNRealVectorMeasure_apply_measurable hi₁] at hi₂ rw [withDensityᵥ_apply hf hi₁, Measure.restrict_zero_set hi₂, integral_zero_measure] · rw [withDensityᵥ, dif_neg hf] exact VectorMeasure.AbsolutelyContinuous.zero _
import Mathlib.Algebra.MonoidAlgebra.Support import Mathlib.Algebra.Polynomial.Basic import Mathlib.Algebra.Regular.Basic import Mathlib.Data.Nat.Choose.Sum #align_import data.polynomial.coeff from "leanprover-community/mathlib"@"2651125b48fc5c170ab1111afd0817c903b1fc6c" set_option linter.uppercaseLean3 false noncomputable section open Finsupp Finset AddMonoidAlgebra open Polynomial namespace Polynomial universe u v variable {R : Type u} {S : Type v} {a b : R} {n m : ℕ} variable [Semiring R] {p q r : R[X]} section Coeff @[simp] theorem coeff_add (p q : R[X]) (n : ℕ) : coeff (p + q) n = coeff p n + coeff q n := by rcases p with ⟨⟩ rcases q with ⟨⟩ simp_rw [← ofFinsupp_add, coeff] exact Finsupp.add_apply _ _ _ #align polynomial.coeff_add Polynomial.coeff_add set_option linter.deprecated false in @[simp] theorem coeff_bit0 (p : R[X]) (n : ℕ) : coeff (bit0 p) n = bit0 (coeff p n) := by simp [bit0] #align polynomial.coeff_bit0 Polynomial.coeff_bit0 @[simp] theorem coeff_smul [SMulZeroClass S R] (r : S) (p : R[X]) (n : ℕ) : coeff (r • p) n = r • coeff p n := by rcases p with ⟨⟩ simp_rw [← ofFinsupp_smul, coeff] exact Finsupp.smul_apply _ _ _ #align polynomial.coeff_smul Polynomial.coeff_smul theorem support_smul [SMulZeroClass S R] (r : S) (p : R[X]) : support (r • p) ⊆ support p := by intro i hi simp? [mem_support_iff] at hi ⊢ says simp only [mem_support_iff, coeff_smul, ne_eq] at hi ⊢ contrapose! hi simp [hi] #align polynomial.support_smul Polynomial.support_smul open scoped Pointwise in theorem card_support_mul_le : (p * q).support.card ≤ p.support.card * q.support.card := by calc (p * q).support.card _ = (p.toFinsupp * q.toFinsupp).support.card := by rw [← support_toFinsupp, toFinsupp_mul] _ ≤ (p.toFinsupp.support + q.toFinsupp.support).card := Finset.card_le_card (AddMonoidAlgebra.support_mul p.toFinsupp q.toFinsupp) _ ≤ p.support.card * q.support.card := Finset.card_image₂_le .. @[simps] def lsum {R A M : Type} [Semiring R] [Semiring A] [AddCommMonoid M] [Module R A] [Module R M] (f : ℕ → A →ₗ[R] M) : A[X] →ₗ[R] M where toFun p := p.sum (f · ·) map_add' p q := sum_add_index p q _ (fun n => (f n).map_zero) fun n _ _ => (f n).map_add _ _ map_smul' c p := by -- Porting note: added `dsimp only`; `beta_reduce` alone is not sufficient dsimp only rw [sum_eq_of_subset (f · ·) (fun n => (f n).map_zero) (support_smul c p)] simp only [sum_def, Finset.smul_sum, coeff_smul, LinearMap.map_smul, RingHom.id_apply] #align polynomial.lsum Polynomial.lsum #align polynomial.lsum_apply Polynomial.lsum_apply variable (R) def lcoeff (n : ℕ) : R[X] →ₗ[R] R where toFun p := coeff p n map_add' p q := coeff_add p q n map_smul' r p := coeff_smul r p n #align polynomial.lcoeff Polynomial.lcoeff variable {R} @[simp] theorem lcoeff_apply (n : ℕ) (f : R[X]) : lcoeff R n f = coeff f n := rfl #align polynomial.lcoeff_apply Polynomial.lcoeff_apply @[simp] theorem finset_sum_coeff {ι : Type} (s : Finset ι) (f : ι → R[X]) (n : ℕ) : coeff (∑ b ∈ s, f b) n = ∑ b ∈ s, coeff (f b) n := map_sum (lcoeff R n) _ _ #align polynomial.finset_sum_coeff Polynomial.finset_sum_coeff lemma coeff_list_sum (l : List R[X]) (n : ℕ) : l.sum.coeff n = (l.map (lcoeff R n)).sum := map_list_sum (lcoeff R n) _ lemma coeff_list_sum_map {ι : Type} (l : List ι) (f : ι → R[X]) (n : ℕ) : (l.map f).sum.coeff n = (l.map (fun a => (f a).coeff n)).sum := by simp_rw [coeff_list_sum, List.map_map, Function.comp, lcoeff_apply] theorem coeff_sum [Semiring S] (n : ℕ) (f : ℕ → R → S[X]) : coeff (p.sum f) n = p.sum fun a b => coeff (f a b) n := by rcases p with ⟨⟩ -- porting note (#10745): was `simp [Polynomial.sum, support, coeff]`. simp [Polynomial.sum, support_ofFinsupp, coeff_ofFinsupp] #align polynomial.coeff_sum Polynomial.coeff_sum theorem coeff_mul (p q : R[X]) (n : ℕ) : coeff (p q) n = ∑ x ∈ antidiagonal n, coeff p x.1 * coeff q x.2 := by rcases p with ⟨p⟩; rcases q with ⟨q⟩ simp_rw [← ofFinsupp_mul, coeff] exact AddMonoidAlgebra.mul_apply_antidiagonal p q n _ Finset.mem_antidiagonal #align polynomial.coeff_mul Polynomial.coeff_mul @[simp] theorem mul_coeff_zero (p q : R[X]) : coeff (p * q) 0 = coeff p 0 * coeff q 0 := by simp [coeff_mul] #align polynomial.mul_coeff_zero Polynomial.mul_coeff_zero @[simps] def constantCoeff : R[X] →+* R where toFun p := coeff p 0 map_one' := coeff_one_zero map_mul' := mul_coeff_zero map_zero' := coeff_zero 0 map_add' p q := coeff_add p q 0 #align polynomial.constant_coeff Polynomial.constantCoeff #align polynomial.constant_coeff_apply Polynomial.constantCoeff_apply theorem isUnit_C {x : R} : IsUnit (C x) ↔ IsUnit x := ⟨fun h => (congr_arg IsUnit coeff_C_zero).mp (h.map <\| @constantCoeff R _), fun h => h.map C⟩ #align polynomial.is_unit_C Polynomial.isUnit_C theorem coeff_mul_X_zero (p : R[X]) : coeff (p * X) 0 = 0 := by simp #align polynomial.coeff_mul_X_zero Polynomial.coeff_mul_X_zero theorem coeff_X_mul_zero (p : R[X]) : coeff (X * p) 0 = 0 := by simp #align polynomial.coeff_X_mul_zero Polynomial.coeff_X_mul_zero theorem coeff_C_mul_X_pow (x : R) (k n : ℕ) : coeff (C x * X ^ k : R[X]) n = if n = k then x else 0 := by rw [C_mul_X_pow_eq_monomial, coeff_monomial] congr 1 simp [eq_comm] #align polynomial.coeff_C_mul_X_pow Polynomial.coeff_C_mul_X_pow theorem coeff_C_mul_X (x : R) (n : ℕ) : coeff (C x * X : R[X]) n = if n = 1 then x else 0 := by rw [← pow_one X, coeff_C_mul_X_pow] #align polynomial.coeff_C_mul_X Polynomial.coeff_C_mul_X @[simp] theorem coeff_C_mul (p : R[X]) : coeff (C a * p) n = a * coeff p n := by rcases p with ⟨p⟩ simp_rw [← monomial_zero_left, ← ofFinsupp_single, ← ofFinsupp_mul, coeff] exact AddMonoidAlgebra.single_zero_mul_apply p a n #align polynomial.coeff_C_mul Polynomial.coeff_C_mul theorem C_mul' (a : R) (f : R[X]) : C a * f = a • f := by ext rw [coeff_C_mul, coeff_smul, smul_eq_mul] #align polynomial.C_mul' Polynomial.C_mul' @[simp] theorem coeff_mul_C (p : R[X]) (n : ℕ) (a : R) : coeff (p * C a) n = coeff p n * a := by rcases p with ⟨p⟩ simp_rw [← monomial_zero_left, ← ofFinsupp_single, ← ofFinsupp_mul, coeff] exact AddMonoidAlgebra.mul_single_zero_apply p a n #align polynomial.coeff_mul_C Polynomial.coeff_mul_C @[simp] lemma coeff_mul_natCast {a k : ℕ} : coeff (p * (a : R[X])) k = coeff p k * (↑a : R) := coeff_mul_C _ _ _ @[simp] lemma coeff_natCast_mul {a k : ℕ} : coeff ((a : R[X]) * p) k = a * coeff p k := coeff_C_mul _ -- See note [no_index around OfNat.ofNat] @[simp] lemma coeff_mul_ofNat {a k : ℕ} [Nat.AtLeastTwo a] : coeff (p * (no_index (OfNat.ofNat a) : R[X])) k = coeff p k * OfNat.ofNat a := coeff_mul_C _ _ _ -- See note [no_index around OfNat.ofNat] @[simp] lemma coeff_ofNat_mul {a k : ℕ} [Nat.AtLeastTwo a] : coeff ((no_index (OfNat.ofNat a) : R[X]) * p) k = OfNat.ofNat a * coeff p k := coeff_C_mul _ @[simp] lemma coeff_mul_intCast [Ring S] {p : S[X]} {a : ℤ} {k : ℕ} : coeff (p * (a : S[X])) k = coeff p k * (↑a : S) := coeff_mul_C _ _ _ @[simp] lemma coeff_intCast_mul [Ring S] {p : S[X]} {a : ℤ} {k : ℕ} : coeff ((a : S[X]) * p) k = a * coeff p k := coeff_C_mul _ @[simp] theorem coeff_X_pow (k n : ℕ) : coeff (X ^ k : R[X]) n = if n = k then 1 else 0 := by simp only [one_mul, RingHom.map_one, ← coeff_C_mul_X_pow] #align polynomial.coeff_X_pow Polynomial.coeff_X_pow theorem coeff_X_pow_self (n : ℕ) : coeff (X ^ n : R[X]) n = 1 := by simp #align polynomial.coeff_X_pow_self Polynomial.coeff_X_pow_self @[simp] theorem coeff_mul_X_pow (p : R[X]) (n d : ℕ) : coeff (p * Polynomial.X ^ n) (d + n) = coeff p d := by rw [coeff_mul, Finset.sum_eq_single (d, n), coeff_X_pow, if_pos rfl, mul_one] · rintro ⟨i, j⟩ h1 h2 rw [coeff_X_pow, if_neg, mul_zero] rintro rfl apply h2 rw [mem_antidiagonal, add_right_cancel_iff] at h1 subst h1 rfl · exact fun h1 => (h1 (mem_antidiagonal.2 rfl)).elim #align polynomial.coeff_mul_X_pow Polynomial.coeff_mul_X_pow @[simp] theorem coeff_X_pow_mul (p : R[X]) (n d : ℕ) : coeff (Polynomial.X ^ n * p) (d + n) = coeff p d := by rw [(commute_X_pow p n).eq, coeff_mul_X_pow] #align polynomial.coeff_X_pow_mul Polynomial.coeff_X_pow_mul theorem coeff_mul_X_pow' (p : R[X]) (n d : ℕ) : (p * X ^ n).coeff d = ite (n ≤ d) (p.coeff (d - n)) 0 := by split_ifs with h · rw [← tsub_add_cancel_of_le h, coeff_mul_X_pow, add_tsub_cancel_right] · refine (coeff_mul _ _ _).trans (Finset.sum_eq_zero fun x hx => ?_) rw [coeff_X_pow, if_neg, mul_zero] exact ((le_of_add_le_right (mem_antidiagonal.mp hx).le).trans_lt <\| not_le.mp h).ne #align polynomial.coeff_mul_X_pow' Polynomial.coeff_mul_X_pow' theorem coeff_X_pow_mul' (p : R[X]) (n d : ℕ) : (X ^ n * p).coeff d = ite (n ≤ d) (p.coeff (d - n)) 0 := by rw [(commute_X_pow p n).eq, coeff_mul_X_pow'] #align polynomial.coeff_X_pow_mul' Polynomial.coeff_X_pow_mul' @[simp] theorem coeff_mul_X (p : R[X]) (n : ℕ) : coeff (p * X) (n + 1) = coeff p n := by simpa only [pow_one] using coeff_mul_X_pow p 1 n #align polynomial.coeff_mul_X Polynomial.coeff_mul_X @[simp] theorem coeff_X_mul (p : R[X]) (n : ℕ) : coeff (X * p) (n + 1) = coeff p n := by rw [(commute_X p).eq, coeff_mul_X] #align polynomial.coeff_X_mul Polynomial.coeff_X_mul theorem coeff_mul_monomial (p : R[X]) (n d : ℕ) (r : R) : coeff (p * monomial n r) (d + n) = coeff p d * r := by rw [← C_mul_X_pow_eq_monomial, ← X_pow_mul, ← mul_assoc, coeff_mul_C, coeff_mul_X_pow] #align polynomial.coeff_mul_monomial Polynomial.coeff_mul_monomial theorem coeff_monomial_mul (p : R[X]) (n d : ℕ) (r : R) : coeff (monomial n r * p) (d + n) = r * coeff p d := by rw [← C_mul_X_pow_eq_monomial, mul_assoc, coeff_C_mul, X_pow_mul, coeff_mul_X_pow] #align polynomial.coeff_monomial_mul Polynomial.coeff_monomial_mul -- This can already be proved by `simp`. theorem coeff_mul_monomial_zero (p : R[X]) (d : ℕ) (r : R) : coeff (p * monomial 0 r) d = coeff p d * r := coeff_mul_monomial p 0 d r #align polynomial.coeff_mul_monomial_zero Polynomial.coeff_mul_monomial_zero -- This can already be proved by `simp`. theorem coeff_monomial_zero_mul (p : R[X]) (d : ℕ) (r : R) : coeff (monomial 0 r * p) d = r * coeff p d := coeff_monomial_mul p 0 d r #align polynomial.coeff_monomial_zero_mul Polynomial.coeff_monomial_zero_mul theorem mul_X_pow_eq_zero {p : R[X]} {n : ℕ} (H : p * X ^ n = 0) : p = 0 := ext fun k => (coeff_mul_X_pow p n k).symm.trans <\| ext_iff.1 H (k + n) #align polynomial.mul_X_pow_eq_zero Polynomial.mul_X_pow_eq_zero theorem isRegular_X_pow (n : ℕ) : IsRegular (X ^ n : R[X]) := by suffices IsLeftRegular (X^n : R[X]) from ⟨this, this.right_of_commute (fun p => commute_X_pow p n)⟩ intro P Q (hPQ : X^n * P = X^n * Q) ext i rw [← coeff_X_pow_mul P n i, hPQ, coeff_X_pow_mul Q n i] @[simp] theorem isRegular_X : IsRegular (X : R[X]) := pow_one (X : R[X]) ▸ isRegular_X_pow 1 theorem coeff_X_add_C_pow (r : R) (n k : ℕ) : ((X + C r) ^ n).coeff k = r ^ (n - k) * (n.choose k : R) := by rw [(commute_X (C r : R[X])).add_pow, ← lcoeff_apply, map_sum] simp only [one_pow, mul_one, lcoeff_apply, ← C_eq_natCast, ← C_pow, coeff_mul_C, Nat.cast_id] rw [Finset.sum_eq_single k, coeff_X_pow_self, one_mul] · intro _ _ h simp [coeff_X_pow, h.symm] · simp only [coeff_X_pow_self, one_mul, not_lt, Finset.mem_range] intro h rw [Nat.choose_eq_zero_of_lt h, Nat.cast_zero, mul_zero] #align polynomial.coeff_X_add_C_pow Polynomial.coeff_X_add_C_pow theorem coeff_X_add_one_pow (R : Type*) [Semiring R] (n k : ℕ) : ((X + 1) ^ n).coeff k = (n.choose k : R) := by rw [← C_1, coeff_X_add_C_pow, one_pow, one_mul] #align polynomial.coeff_X_add_one_pow Polynomial.coeff_X_add_one_pow	Mathlib/Algebra/Polynomial/Coeff.lean	353	354	theorem coeff_one_add_X_pow (R : Type*) [Semiring R] (n k : ℕ) : ((1 + X) ^ n).coeff k = (n.choose k : R) := by	rw [add_comm _ X, coeff_X_add_one_pow]
import Mathlib.Algebra.CharP.Basic import Mathlib.Algebra.CharP.Algebra import Mathlib.Data.Nat.Prime #align_import algebra.char_p.exp_char from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a" universe u variable (R : Type u) section Semiring variable [Semiring R] class inductive ExpChar (R : Type u) [Semiring R] : ℕ → Prop \| zero [CharZero R] : ExpChar R 1 \| prime {q : ℕ} (hprime : q.Prime) [hchar : CharP R q] : ExpChar R q #align exp_char ExpChar #align exp_char.prime ExpChar.prime instance expChar_prime (p) [CharP R p] [Fact p.Prime] : ExpChar R p := ExpChar.prime Fact.out instance expChar_zero [CharZero R] : ExpChar R 1 := ExpChar.zero instance (S : Type) [Semiring S] (p) [ExpChar R p] [ExpChar S p] : ExpChar (R × S) p := by obtain hp \| ⟨hp⟩ := ‹ExpChar R p› · have := Prod.charZero_of_left R S; exact .zero obtain _ \| _ := ‹ExpChar S p› · exact (Nat.not_prime_one hp).elim · have := Prod.charP R S p; exact .prime hp variable {R} in theorem ExpChar.eq {p q : ℕ} (hp : ExpChar R p) (hq : ExpChar R q) : p = q := by cases' hp with hp _ hp' hp · cases' hq with hq _ hq' hq exacts [rfl, False.elim (Nat.not_prime_zero (CharP.eq R hq (CharP.ofCharZero R) ▸ hq'))] · cases' hq with hq _ hq' hq exacts [False.elim (Nat.not_prime_zero (CharP.eq R hp (CharP.ofCharZero R) ▸ hp')), CharP.eq R hp hq] theorem ExpChar.congr {p : ℕ} (q : ℕ) [hq : ExpChar R q] (h : q = p) : ExpChar R p := h ▸ hq noncomputable def ringExpChar (R : Type) [NonAssocSemiring R] : ℕ := max (ringChar R) 1	Mathlib/Algebra/CharP/ExpChar.lean	74	79	theorem ringExpChar.eq (q : ℕ) [h : ExpChar R q] : ringExpChar R = q := by	cases' h with _ _ h _ · haveI := CharP.ofCharZero R rw [ringExpChar, ringChar.eq R 0]; rfl rw [ringExpChar, ringChar.eq R q] exact Nat.max_eq_left h.one_lt.le
import Mathlib.Geometry.Euclidean.Angle.Oriented.Affine import Mathlib.Geometry.Euclidean.Angle.Unoriented.Affine import Mathlib.Tactic.IntervalCases #align_import geometry.euclidean.triangle from "leanprover-community/mathlib"@"46b633fd842bef9469441c0209906f6dddd2b4f5" noncomputable section open scoped Classical open scoped Real open scoped RealInnerProductSpace namespace InnerProductGeometry variable {V : Type} [NormedAddCommGroup V] [InnerProductSpace ℝ V] theorem norm_sub_sq_eq_norm_sq_add_norm_sq_sub_two_mul_norm_mul_norm_mul_cos_angle (x y : V) : ‖x - y‖ ‖x - y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ - 2 * ‖x‖ * ‖y‖ * Real.cos (angle x y) := by rw [show 2 * ‖x‖ * ‖y‖ * Real.cos (angle x y) = 2 * (Real.cos (angle x y) * (‖x‖ * ‖y‖)) by ring, cos_angle_mul_norm_mul_norm, ← real_inner_self_eq_norm_mul_norm, ← real_inner_self_eq_norm_mul_norm, ← real_inner_self_eq_norm_mul_norm, real_inner_sub_sub_self, sub_add_eq_add_sub] #align inner_product_geometry.norm_sub_sq_eq_norm_sq_add_norm_sq_sub_two_mul_norm_mul_norm_mul_cos_angle InnerProductGeometry.norm_sub_sq_eq_norm_sq_add_norm_sq_sub_two_mul_norm_mul_norm_mul_cos_angle theorem angle_sub_eq_angle_sub_rev_of_norm_eq {x y : V} (h : ‖x‖ = ‖y‖) : angle x (x - y) = angle y (y - x) := by refine Real.injOn_cos ⟨angle_nonneg _ _, angle_le_pi _ _⟩ ⟨angle_nonneg _ _, angle_le_pi _ _⟩ ?_ rw [cos_angle, cos_angle, h, ← neg_sub, norm_neg, neg_sub, inner_sub_right, inner_sub_right, real_inner_self_eq_norm_mul_norm, real_inner_self_eq_norm_mul_norm, h, real_inner_comm x y] #align inner_product_geometry.angle_sub_eq_angle_sub_rev_of_norm_eq InnerProductGeometry.angle_sub_eq_angle_sub_rev_of_norm_eq theorem norm_eq_of_angle_sub_eq_angle_sub_rev_of_angle_ne_pi {x y : V} (h : angle x (x - y) = angle y (y - x)) (hpi : angle x y ≠ π) : ‖x‖ = ‖y‖ := by replace h := Real.arccos_injOn (abs_le.mp (abs_real_inner_div_norm_mul_norm_le_one x (x - y))) (abs_le.mp (abs_real_inner_div_norm_mul_norm_le_one y (y - x))) h by_cases hxy : x = y · rw [hxy] · rw [← norm_neg (y - x), neg_sub, mul_comm, mul_comm ‖y‖, div_eq_mul_inv, div_eq_mul_inv, mul_inv_rev, mul_inv_rev, ← mul_assoc, ← mul_assoc] at h replace h := mul_right_cancel₀ (inv_ne_zero fun hz => hxy (eq_of_sub_eq_zero (norm_eq_zero.1 hz))) h rw [inner_sub_right, inner_sub_right, real_inner_comm x y, real_inner_self_eq_norm_mul_norm, real_inner_self_eq_norm_mul_norm, mul_sub_right_distrib, mul_sub_right_distrib, mul_self_mul_inv, mul_self_mul_inv, sub_eq_sub_iff_sub_eq_sub, ← mul_sub_left_distrib] at h by_cases hx0 : x = 0 · rw [hx0, norm_zero, inner_zero_left, zero_mul, zero_sub, neg_eq_zero] at h rw [hx0, norm_zero, h] · by_cases hy0 : y = 0 · rw [hy0, norm_zero, inner_zero_right, zero_mul, sub_zero] at h rw [hy0, norm_zero, h] · rw [inv_sub_inv (fun hz => hx0 (norm_eq_zero.1 hz)) fun hz => hy0 (norm_eq_zero.1 hz), ← neg_sub, ← mul_div_assoc, mul_comm, mul_div_assoc, ← mul_neg_one] at h symm by_contra hyx replace h := (mul_left_cancel₀ (sub_ne_zero_of_ne hyx) h).symm rw [real_inner_div_norm_mul_norm_eq_neg_one_iff, ← angle_eq_pi_iff] at h exact hpi h #align inner_product_geometry.norm_eq_of_angle_sub_eq_angle_sub_rev_of_angle_ne_pi InnerProductGeometry.norm_eq_of_angle_sub_eq_angle_sub_rev_of_angle_ne_pi theorem cos_angle_sub_add_angle_sub_rev_eq_neg_cos_angle {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : Real.cos (angle x (x - y) + angle y (y - x)) = -Real.cos (angle x y) := by by_cases hxy : x = y · rw [hxy, angle_self hy] simp · rw [Real.cos_add, cos_angle, cos_angle, cos_angle] have hxn : ‖x‖ ≠ 0 := fun h => hx (norm_eq_zero.1 h) have hyn : ‖y‖ ≠ 0 := fun h => hy (norm_eq_zero.1 h) have hxyn : ‖x - y‖ ≠ 0 := fun h => hxy (eq_of_sub_eq_zero (norm_eq_zero.1 h)) apply mul_right_cancel₀ hxn apply mul_right_cancel₀ hyn apply mul_right_cancel₀ hxyn apply mul_right_cancel₀ hxyn have H1 : Real.sin (angle x (x - y)) * Real.sin (angle y (y - x)) * ‖x‖ * ‖y‖ * ‖x - y‖ * ‖x - y‖ = Real.sin (angle x (x - y)) * (‖x‖ * ‖x - y‖) * (Real.sin (angle y (y - x)) * (‖y‖ * ‖x - y‖)) := by ring have H2 : ⟪x, x⟫ * (⟪x, x⟫ - ⟪x, y⟫ - (⟪x, y⟫ - ⟪y, y⟫)) - (⟪x, x⟫ - ⟪x, y⟫) * (⟪x, x⟫ - ⟪x, y⟫) = ⟪x, x⟫ * ⟪y, y⟫ - ⟪x, y⟫ * ⟪x, y⟫ := by ring have H3 : ⟪y, y⟫ * (⟪y, y⟫ - ⟪x, y⟫ - (⟪x, y⟫ - ⟪x, x⟫)) - (⟪y, y⟫ - ⟪x, y⟫) * (⟪y, y⟫ - ⟪x, y⟫) = ⟪x, x⟫ * ⟪y, y⟫ - ⟪x, y⟫ * ⟪x, y⟫ := by ring rw [mul_sub_right_distrib, mul_sub_right_distrib, mul_sub_right_distrib, mul_sub_right_distrib, H1, sin_angle_mul_norm_mul_norm, norm_sub_rev x y, sin_angle_mul_norm_mul_norm, norm_sub_rev y x, inner_sub_left, inner_sub_left, inner_sub_right, inner_sub_right, inner_sub_right, inner_sub_right, real_inner_comm x y, H2, H3, Real.mul_self_sqrt (sub_nonneg_of_le (real_inner_mul_inner_self_le x y)), real_inner_self_eq_norm_mul_norm, real_inner_self_eq_norm_mul_norm, real_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two] field_simp [hxn, hyn, hxyn] ring #align inner_product_geometry.cos_angle_sub_add_angle_sub_rev_eq_neg_cos_angle InnerProductGeometry.cos_angle_sub_add_angle_sub_rev_eq_neg_cos_angle theorem sin_angle_sub_add_angle_sub_rev_eq_sin_angle {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : Real.sin (angle x (x - y) + angle y (y - x)) = Real.sin (angle x y) := by by_cases hxy : x = y · rw [hxy, angle_self hy] simp · rw [Real.sin_add, cos_angle, cos_angle] have hxn : ‖x‖ ≠ 0 := fun h => hx (norm_eq_zero.1 h) have hyn : ‖y‖ ≠ 0 := fun h => hy (norm_eq_zero.1 h) have hxyn : ‖x - y‖ ≠ 0 := fun h => hxy (eq_of_sub_eq_zero (norm_eq_zero.1 h)) apply mul_right_cancel₀ hxn apply mul_right_cancel₀ hyn apply mul_right_cancel₀ hxyn apply mul_right_cancel₀ hxyn have H1 : Real.sin (angle x (x - y)) * (⟪y, y - x⟫ / (‖y‖ * ‖y - x‖)) * ‖x‖ * ‖y‖ * ‖x - y‖ = Real.sin (angle x (x - y)) * (‖x‖ * ‖x - y‖) * (⟪y, y - x⟫ / (‖y‖ * ‖y - x‖)) * ‖y‖ := by ring have H2 : ⟪x, x - y⟫ / (‖x‖ * ‖y - x‖) * Real.sin (angle y (y - x)) * ‖x‖ * ‖y‖ * ‖y - x‖ = ⟪x, x - y⟫ / (‖x‖ * ‖y - x‖) * (Real.sin (angle y (y - x)) * (‖y‖ * ‖y - x‖)) * ‖x‖ := by ring have H3 : ⟪x, x⟫ * (⟪x, x⟫ - ⟪x, y⟫ - (⟪x, y⟫ - ⟪y, y⟫)) - (⟪x, x⟫ - ⟪x, y⟫) * (⟪x, x⟫ - ⟪x, y⟫) = ⟪x, x⟫ * ⟪y, y⟫ - ⟪x, y⟫ * ⟪x, y⟫ := by ring have H4 : ⟪y, y⟫ * (⟪y, y⟫ - ⟪x, y⟫ - (⟪x, y⟫ - ⟪x, x⟫)) - (⟪y, y⟫ - ⟪x, y⟫) * (⟪y, y⟫ - ⟪x, y⟫) = ⟪x, x⟫ * ⟪y, y⟫ - ⟪x, y⟫ * ⟪x, y⟫ := by ring rw [right_distrib, right_distrib, right_distrib, right_distrib, H1, sin_angle_mul_norm_mul_norm, norm_sub_rev x y, H2, sin_angle_mul_norm_mul_norm, norm_sub_rev y x, mul_assoc (Real.sin (angle x y)), sin_angle_mul_norm_mul_norm, inner_sub_left, inner_sub_left, inner_sub_right, inner_sub_right, inner_sub_right, inner_sub_right, real_inner_comm x y, H3, H4, real_inner_self_eq_norm_mul_norm, real_inner_self_eq_norm_mul_norm, real_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two] field_simp [hxn, hyn, hxyn] ring #align inner_product_geometry.sin_angle_sub_add_angle_sub_rev_eq_sin_angle InnerProductGeometry.sin_angle_sub_add_angle_sub_rev_eq_sin_angle	Mathlib/Geometry/Euclidean/Triangle.lean	189	193	theorem cos_angle_add_angle_sub_add_angle_sub_eq_neg_one {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : Real.cos (angle x y + angle x (x - y) + angle y (y - x)) = -1 := by	rw [add_assoc, Real.cos_add, cos_angle_sub_add_angle_sub_rev_eq_neg_cos_angle hx hy, sin_angle_sub_add_angle_sub_rev_eq_sin_angle hx hy, mul_neg, ← neg_add', add_comm, ← sq, ← sq, Real.sin_sq_add_cos_sq]
import Mathlib.FieldTheory.Minpoly.Field #align_import ring_theory.power_basis from "leanprover-community/mathlib"@"d1d69e99ed34c95266668af4e288fc1c598b9a7f" open Polynomial open Polynomial variable {R S T : Type} [CommRing R] [Ring S] [Algebra R S] variable {A B : Type} [CommRing A] [CommRing B] [IsDomain B] [Algebra A B] variable {K : Type} [Field K] -- Porting note(#5171): this linter isn't ported yet. -- @[nolint has_nonempty_instance] structure PowerBasis (R S : Type) [CommRing R] [Ring S] [Algebra R S] where gen : S dim : ℕ basis : Basis (Fin dim) R S basis_eq_pow : ∀ (i), basis i = gen ^ (i : ℕ) #align power_basis PowerBasis -- this is usually not needed because of `basis_eq_pow` but can be needed in some cases; -- in such circumstances, add it manually using `@[simps dim gen basis]`. initialize_simps_projections PowerBasis (-basis) namespace PowerBasis @[simp] theorem coe_basis (pb : PowerBasis R S) : ⇑pb.basis = fun i : Fin pb.dim => pb.gen ^ (i : ℕ) := funext pb.basis_eq_pow #align power_basis.coe_basis PowerBasis.coe_basis theorem finite (pb : PowerBasis R S) : Module.Finite R S := .of_basis pb.basis #align power_basis.finite_dimensional PowerBasis.finite @[deprecated] alias finiteDimensional := PowerBasis.finite theorem finrank [StrongRankCondition R] (pb : PowerBasis R S) : FiniteDimensional.finrank R S = pb.dim := by rw [FiniteDimensional.finrank_eq_card_basis pb.basis, Fintype.card_fin] #align power_basis.finrank PowerBasis.finrank theorem mem_span_pow' {x y : S} {d : ℕ} : y ∈ Submodule.span R (Set.range fun i : Fin d => x ^ (i : ℕ)) ↔ ∃ f : R[X], f.degree < d ∧ y = aeval x f := by have : (Set.range fun i : Fin d => x ^ (i : ℕ)) = (fun i : ℕ => x ^ i) '' ↑(Finset.range d) := by ext n simp_rw [Set.mem_range, Set.mem_image, Finset.mem_coe, Finset.mem_range] exact ⟨fun ⟨⟨i, hi⟩, hy⟩ => ⟨i, hi, hy⟩, fun ⟨i, hi, hy⟩ => ⟨⟨i, hi⟩, hy⟩⟩ simp only [this, Finsupp.mem_span_image_iff_total, degree_lt_iff_coeff_zero, support, exists_iff_exists_finsupp, coeff, aeval_def, eval₂RingHom', eval₂_eq_sum, Polynomial.sum, Finsupp.mem_supported', Finsupp.total, Finsupp.sum, Algebra.smul_def, eval₂_zero, exists_prop, LinearMap.id_coe, eval₂_one, id, not_lt, Finsupp.coe_lsum, LinearMap.coe_smulRight, Finset.mem_range, AlgHom.coe_mks, Finset.mem_coe] simp_rw [@eq_comm _ y] exact Iff.rfl #align power_basis.mem_span_pow' PowerBasis.mem_span_pow' theorem mem_span_pow {x y : S} {d : ℕ} (hd : d ≠ 0) : y ∈ Submodule.span R (Set.range fun i : Fin d => x ^ (i : ℕ)) ↔ ∃ f : R[X], f.natDegree < d ∧ y = aeval x f := by rw [mem_span_pow'] constructor <;> · rintro ⟨f, h, hy⟩ refine ⟨f, ?_, hy⟩ by_cases hf : f = 0 · simp only [hf, natDegree_zero, degree_zero] at h ⊢ first \| exact lt_of_le_of_ne (Nat.zero_le d) hd.symm \| exact WithBot.bot_lt_coe d simp_all only [degree_eq_natDegree hf] · first \| exact WithBot.coe_lt_coe.1 h \| exact WithBot.coe_lt_coe.2 h #align power_basis.mem_span_pow PowerBasis.mem_span_pow theorem dim_ne_zero [Nontrivial S] (pb : PowerBasis R S) : pb.dim ≠ 0 := fun h => not_nonempty_iff.mpr (h.symm ▸ Fin.isEmpty : IsEmpty (Fin pb.dim)) pb.basis.index_nonempty #align power_basis.dim_ne_zero PowerBasis.dim_ne_zero theorem dim_pos [Nontrivial S] (pb : PowerBasis R S) : 0 < pb.dim := Nat.pos_of_ne_zero pb.dim_ne_zero #align power_basis.dim_pos PowerBasis.dim_pos theorem exists_eq_aeval [Nontrivial S] (pb : PowerBasis R S) (y : S) : ∃ f : R[X], f.natDegree < pb.dim ∧ y = aeval pb.gen f := (mem_span_pow pb.dim_ne_zero).mp (by simpa using pb.basis.mem_span y) #align power_basis.exists_eq_aeval PowerBasis.exists_eq_aeval theorem exists_eq_aeval' (pb : PowerBasis R S) (y : S) : ∃ f : R[X], y = aeval pb.gen f := by nontriviality S obtain ⟨f, _, hf⟩ := exists_eq_aeval pb y exact ⟨f, hf⟩ #align power_basis.exists_eq_aeval' PowerBasis.exists_eq_aeval' theorem algHom_ext {S' : Type} [Semiring S'] [Algebra R S'] (pb : PowerBasis R S) ⦃f g : S →ₐ[R] S'⦄ (h : f pb.gen = g pb.gen) : f = g := by ext x obtain ⟨f, rfl⟩ := pb.exists_eq_aeval' x rw [← Polynomial.aeval_algHom_apply, ← Polynomial.aeval_algHom_apply, h] #align power_basis.alg_hom_ext PowerBasis.algHom_ext section minpoly variable [Algebra A S] noncomputable def minpolyGen (pb : PowerBasis A S) : A[X] := X ^ pb.dim - ∑ i : Fin pb.dim, C (pb.basis.repr (pb.gen ^ pb.dim) i) X ^ (i : ℕ) #align power_basis.minpoly_gen PowerBasis.minpolyGen	Mathlib/RingTheory/PowerBasis.lean	154	159	theorem aeval_minpolyGen (pb : PowerBasis A S) : aeval pb.gen (minpolyGen pb) = 0 := by	simp_rw [minpolyGen, AlgHom.map_sub, AlgHom.map_sum, AlgHom.map_mul, AlgHom.map_pow, aeval_C, ← Algebra.smul_def, aeval_X] refine sub_eq_zero.mpr ((pb.basis.total_repr (pb.gen ^ pb.dim)).symm.trans ?_) rw [Finsupp.total_apply, Finsupp.sum_fintype] <;> simp only [pb.coe_basis, zero_smul, eq_self_iff_true, imp_true_iff]
import Mathlib.Analysis.InnerProductSpace.TwoDim import Mathlib.Geometry.Euclidean.Angle.Unoriented.Basic #align_import geometry.euclidean.angle.oriented.basic from "leanprover-community/mathlib"@"f0c8bf9245297a541f468be517f1bde6195105e9" noncomputable section open FiniteDimensional Complex open scoped Real RealInnerProductSpace ComplexConjugate namespace Orientation attribute [local instance] Complex.finrank_real_complex_fact variable {V V' : Type} variable [NormedAddCommGroup V] [NormedAddCommGroup V'] variable [InnerProductSpace ℝ V] [InnerProductSpace ℝ V'] variable [Fact (finrank ℝ V = 2)] [Fact (finrank ℝ V' = 2)] (o : Orientation ℝ V (Fin 2)) local notation "ω" => o.areaForm def oangle (x y : V) : Real.Angle := Complex.arg (o.kahler x y) #align orientation.oangle Orientation.oangle theorem continuousAt_oangle {x : V × V} (hx1 : x.1 ≠ 0) (hx2 : x.2 ≠ 0) : ContinuousAt (fun y : V × V => o.oangle y.1 y.2) x := by refine (Complex.continuousAt_arg_coe_angle ?_).comp ?_ · exact o.kahler_ne_zero hx1 hx2 exact ((continuous_ofReal.comp continuous_inner).add ((continuous_ofReal.comp o.areaForm'.continuous₂).mul continuous_const)).continuousAt #align orientation.continuous_at_oangle Orientation.continuousAt_oangle @[simp] theorem oangle_zero_left (x : V) : o.oangle 0 x = 0 := by simp [oangle] #align orientation.oangle_zero_left Orientation.oangle_zero_left @[simp] theorem oangle_zero_right (x : V) : o.oangle x 0 = 0 := by simp [oangle] #align orientation.oangle_zero_right Orientation.oangle_zero_right @[simp] theorem oangle_self (x : V) : o.oangle x x = 0 := by rw [oangle, kahler_apply_self, ← ofReal_pow] convert QuotientAddGroup.mk_zero (AddSubgroup.zmultiples (2 π)) apply arg_ofReal_of_nonneg positivity #align orientation.oangle_self Orientation.oangle_self theorem left_ne_zero_of_oangle_ne_zero {x y : V} (h : o.oangle x y ≠ 0) : x ≠ 0 := by rintro rfl; simp at h #align orientation.left_ne_zero_of_oangle_ne_zero Orientation.left_ne_zero_of_oangle_ne_zero theorem right_ne_zero_of_oangle_ne_zero {x y : V} (h : o.oangle x y ≠ 0) : y ≠ 0 := by rintro rfl; simp at h #align orientation.right_ne_zero_of_oangle_ne_zero Orientation.right_ne_zero_of_oangle_ne_zero theorem ne_of_oangle_ne_zero {x y : V} (h : o.oangle x y ≠ 0) : x ≠ y := by rintro rfl; simp at h #align orientation.ne_of_oangle_ne_zero Orientation.ne_of_oangle_ne_zero theorem left_ne_zero_of_oangle_eq_pi {x y : V} (h : o.oangle x y = π) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : o.oangle x y ≠ 0) #align orientation.left_ne_zero_of_oangle_eq_pi Orientation.left_ne_zero_of_oangle_eq_pi theorem right_ne_zero_of_oangle_eq_pi {x y : V} (h : o.oangle x y = π) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : o.oangle x y ≠ 0) #align orientation.right_ne_zero_of_oangle_eq_pi Orientation.right_ne_zero_of_oangle_eq_pi theorem ne_of_oangle_eq_pi {x y : V} (h : o.oangle x y = π) : x ≠ y := o.ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : o.oangle x y ≠ 0) #align orientation.ne_of_oangle_eq_pi Orientation.ne_of_oangle_eq_pi theorem left_ne_zero_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = (π / 2 : ℝ)) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.left_ne_zero_of_oangle_eq_pi_div_two Orientation.left_ne_zero_of_oangle_eq_pi_div_two theorem right_ne_zero_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = (π / 2 : ℝ)) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.right_ne_zero_of_oangle_eq_pi_div_two Orientation.right_ne_zero_of_oangle_eq_pi_div_two theorem ne_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = (π / 2 : ℝ)) : x ≠ y := o.ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.ne_of_oangle_eq_pi_div_two Orientation.ne_of_oangle_eq_pi_div_two theorem left_ne_zero_of_oangle_eq_neg_pi_div_two {x y : V} (h : o.oangle x y = (-π / 2 : ℝ)) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.left_ne_zero_of_oangle_eq_neg_pi_div_two Orientation.left_ne_zero_of_oangle_eq_neg_pi_div_two theorem right_ne_zero_of_oangle_eq_neg_pi_div_two {x y : V} (h : o.oangle x y = (-π / 2 : ℝ)) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.right_ne_zero_of_oangle_eq_neg_pi_div_two Orientation.right_ne_zero_of_oangle_eq_neg_pi_div_two theorem ne_of_oangle_eq_neg_pi_div_two {x y : V} (h : o.oangle x y = (-π / 2 : ℝ)) : x ≠ y := o.ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.ne_of_oangle_eq_neg_pi_div_two Orientation.ne_of_oangle_eq_neg_pi_div_two theorem left_ne_zero_of_oangle_sign_ne_zero {x y : V} (h : (o.oangle x y).sign ≠ 0) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 #align orientation.left_ne_zero_of_oangle_sign_ne_zero Orientation.left_ne_zero_of_oangle_sign_ne_zero theorem right_ne_zero_of_oangle_sign_ne_zero {x y : V} (h : (o.oangle x y).sign ≠ 0) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 #align orientation.right_ne_zero_of_oangle_sign_ne_zero Orientation.right_ne_zero_of_oangle_sign_ne_zero theorem ne_of_oangle_sign_ne_zero {x y : V} (h : (o.oangle x y).sign ≠ 0) : x ≠ y := o.ne_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 #align orientation.ne_of_oangle_sign_ne_zero Orientation.ne_of_oangle_sign_ne_zero theorem left_ne_zero_of_oangle_sign_eq_one {x y : V} (h : (o.oangle x y).sign = 1) : x ≠ 0 := o.left_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.left_ne_zero_of_oangle_sign_eq_one Orientation.left_ne_zero_of_oangle_sign_eq_one theorem right_ne_zero_of_oangle_sign_eq_one {x y : V} (h : (o.oangle x y).sign = 1) : y ≠ 0 := o.right_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.right_ne_zero_of_oangle_sign_eq_one Orientation.right_ne_zero_of_oangle_sign_eq_one theorem ne_of_oangle_sign_eq_one {x y : V} (h : (o.oangle x y).sign = 1) : x ≠ y := o.ne_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.ne_of_oangle_sign_eq_one Orientation.ne_of_oangle_sign_eq_one theorem left_ne_zero_of_oangle_sign_eq_neg_one {x y : V} (h : (o.oangle x y).sign = -1) : x ≠ 0 := o.left_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.left_ne_zero_of_oangle_sign_eq_neg_one Orientation.left_ne_zero_of_oangle_sign_eq_neg_one theorem right_ne_zero_of_oangle_sign_eq_neg_one {x y : V} (h : (o.oangle x y).sign = -1) : y ≠ 0 := o.right_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.right_ne_zero_of_oangle_sign_eq_neg_one Orientation.right_ne_zero_of_oangle_sign_eq_neg_one theorem ne_of_oangle_sign_eq_neg_one {x y : V} (h : (o.oangle x y).sign = -1) : x ≠ y := o.ne_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.ne_of_oangle_sign_eq_neg_one Orientation.ne_of_oangle_sign_eq_neg_one theorem oangle_rev (x y : V) : o.oangle y x = -o.oangle x y := by simp only [oangle, o.kahler_swap y x, Complex.arg_conj_coe_angle] #align orientation.oangle_rev Orientation.oangle_rev @[simp] theorem oangle_add_oangle_rev (x y : V) : o.oangle x y + o.oangle y x = 0 := by simp [o.oangle_rev y x] #align orientation.oangle_add_oangle_rev Orientation.oangle_add_oangle_rev theorem oangle_neg_left {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : o.oangle (-x) y = o.oangle x y + π := by simp only [oangle, map_neg] convert Complex.arg_neg_coe_angle _ exact o.kahler_ne_zero hx hy #align orientation.oangle_neg_left Orientation.oangle_neg_left theorem oangle_neg_right {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : o.oangle x (-y) = o.oangle x y + π := by simp only [oangle, map_neg] convert Complex.arg_neg_coe_angle _ exact o.kahler_ne_zero hx hy #align orientation.oangle_neg_right Orientation.oangle_neg_right @[simp] theorem two_zsmul_oangle_neg_left (x y : V) : (2 : ℤ) • o.oangle (-x) y = (2 : ℤ) • o.oangle x y := by by_cases hx : x = 0 · simp [hx] · by_cases hy : y = 0 · simp [hy] · simp [o.oangle_neg_left hx hy] #align orientation.two_zsmul_oangle_neg_left Orientation.two_zsmul_oangle_neg_left @[simp] theorem two_zsmul_oangle_neg_right (x y : V) : (2 : ℤ) • o.oangle x (-y) = (2 : ℤ) • o.oangle x y := by by_cases hx : x = 0 · simp [hx] · by_cases hy : y = 0 · simp [hy] · simp [o.oangle_neg_right hx hy] #align orientation.two_zsmul_oangle_neg_right Orientation.two_zsmul_oangle_neg_right @[simp] theorem oangle_neg_neg (x y : V) : o.oangle (-x) (-y) = o.oangle x y := by simp [oangle] #align orientation.oangle_neg_neg Orientation.oangle_neg_neg theorem oangle_neg_left_eq_neg_right (x y : V) : o.oangle (-x) y = o.oangle x (-y) := by rw [← neg_neg y, oangle_neg_neg, neg_neg] #align orientation.oangle_neg_left_eq_neg_right Orientation.oangle_neg_left_eq_neg_right @[simp] theorem oangle_neg_self_left {x : V} (hx : x ≠ 0) : o.oangle (-x) x = π := by simp [oangle_neg_left, hx] #align orientation.oangle_neg_self_left Orientation.oangle_neg_self_left @[simp] theorem oangle_neg_self_right {x : V} (hx : x ≠ 0) : o.oangle x (-x) = π := by simp [oangle_neg_right, hx] #align orientation.oangle_neg_self_right Orientation.oangle_neg_self_right -- @[simp] -- Porting note (#10618): simp can prove this theorem two_zsmul_oangle_neg_self_left (x : V) : (2 : ℤ) • o.oangle (-x) x = 0 := by by_cases hx : x = 0 <;> simp [hx] #align orientation.two_zsmul_oangle_neg_self_left Orientation.two_zsmul_oangle_neg_self_left -- @[simp] -- Porting note (#10618): simp can prove this theorem two_zsmul_oangle_neg_self_right (x : V) : (2 : ℤ) • o.oangle x (-x) = 0 := by by_cases hx : x = 0 <;> simp [hx] #align orientation.two_zsmul_oangle_neg_self_right Orientation.two_zsmul_oangle_neg_self_right @[simp] theorem oangle_add_oangle_rev_neg_left (x y : V) : o.oangle (-x) y + o.oangle (-y) x = 0 := by rw [oangle_neg_left_eq_neg_right, oangle_rev, add_left_neg] #align orientation.oangle_add_oangle_rev_neg_left Orientation.oangle_add_oangle_rev_neg_left @[simp] theorem oangle_add_oangle_rev_neg_right (x y : V) : o.oangle x (-y) + o.oangle y (-x) = 0 := by rw [o.oangle_rev (-x), oangle_neg_left_eq_neg_right, add_neg_self] #align orientation.oangle_add_oangle_rev_neg_right Orientation.oangle_add_oangle_rev_neg_right @[simp] theorem oangle_smul_left_of_pos (x y : V) {r : ℝ} (hr : 0 < r) : o.oangle (r • x) y = o.oangle x y := by simp [oangle, Complex.arg_real_mul _ hr] #align orientation.oangle_smul_left_of_pos Orientation.oangle_smul_left_of_pos @[simp] theorem oangle_smul_right_of_pos (x y : V) {r : ℝ} (hr : 0 < r) : o.oangle x (r • y) = o.oangle x y := by simp [oangle, Complex.arg_real_mul _ hr] #align orientation.oangle_smul_right_of_pos Orientation.oangle_smul_right_of_pos @[simp] theorem oangle_smul_left_of_neg (x y : V) {r : ℝ} (hr : r < 0) : o.oangle (r • x) y = o.oangle (-x) y := by rw [← neg_neg r, neg_smul, ← smul_neg, o.oangle_smul_left_of_pos _ _ (neg_pos_of_neg hr)] #align orientation.oangle_smul_left_of_neg Orientation.oangle_smul_left_of_neg @[simp] theorem oangle_smul_right_of_neg (x y : V) {r : ℝ} (hr : r < 0) : o.oangle x (r • y) = o.oangle x (-y) := by rw [← neg_neg r, neg_smul, ← smul_neg, o.oangle_smul_right_of_pos _ _ (neg_pos_of_neg hr)] #align orientation.oangle_smul_right_of_neg Orientation.oangle_smul_right_of_neg @[simp] theorem oangle_smul_left_self_of_nonneg (x : V) {r : ℝ} (hr : 0 ≤ r) : o.oangle (r • x) x = 0 := by rcases hr.lt_or_eq with (h \| h) · simp [h] · simp [h.symm] #align orientation.oangle_smul_left_self_of_nonneg Orientation.oangle_smul_left_self_of_nonneg @[simp] theorem oangle_smul_right_self_of_nonneg (x : V) {r : ℝ} (hr : 0 ≤ r) : o.oangle x (r • x) = 0 := by rcases hr.lt_or_eq with (h \| h) · simp [h] · simp [h.symm] #align orientation.oangle_smul_right_self_of_nonneg Orientation.oangle_smul_right_self_of_nonneg @[simp] theorem oangle_smul_smul_self_of_nonneg (x : V) {r₁ r₂ : ℝ} (hr₁ : 0 ≤ r₁) (hr₂ : 0 ≤ r₂) : o.oangle (r₁ • x) (r₂ • x) = 0 := by rcases hr₁.lt_or_eq with (h \| h) · simp [h, hr₂] · simp [h.symm] #align orientation.oangle_smul_smul_self_of_nonneg Orientation.oangle_smul_smul_self_of_nonneg @[simp] theorem two_zsmul_oangle_smul_left_of_ne_zero (x y : V) {r : ℝ} (hr : r ≠ 0) : (2 : ℤ) • o.oangle (r • x) y = (2 : ℤ) • o.oangle x y := by rcases hr.lt_or_lt with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_left_of_ne_zero Orientation.two_zsmul_oangle_smul_left_of_ne_zero @[simp] theorem two_zsmul_oangle_smul_right_of_ne_zero (x y : V) {r : ℝ} (hr : r ≠ 0) : (2 : ℤ) • o.oangle x (r • y) = (2 : ℤ) • o.oangle x y := by rcases hr.lt_or_lt with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_right_of_ne_zero Orientation.two_zsmul_oangle_smul_right_of_ne_zero @[simp] theorem two_zsmul_oangle_smul_left_self (x : V) {r : ℝ} : (2 : ℤ) • o.oangle (r • x) x = 0 := by rcases lt_or_le r 0 with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_left_self Orientation.two_zsmul_oangle_smul_left_self @[simp] theorem two_zsmul_oangle_smul_right_self (x : V) {r : ℝ} : (2 : ℤ) • o.oangle x (r • x) = 0 := by rcases lt_or_le r 0 with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_right_self Orientation.two_zsmul_oangle_smul_right_self @[simp]	Mathlib/Geometry/Euclidean/Angle/Oriented/Basic.lean	374	375	theorem two_zsmul_oangle_smul_smul_self (x : V) {r₁ r₂ : ℝ} : (2 : ℤ) • o.oangle (r₁ • x) (r₂ • x) = 0 := by	by_cases h : r₁ = 0 <;> simp [h]
import Mathlib.Analysis.Calculus.SmoothSeries import Mathlib.Analysis.Calculus.BumpFunction.InnerProduct import Mathlib.Analysis.Convolution import Mathlib.Analysis.InnerProductSpace.EuclideanDist import Mathlib.Data.Set.Pointwise.Support import Mathlib.MeasureTheory.Measure.Haar.NormedSpace import Mathlib.MeasureTheory.Measure.Haar.Unique #align_import analysis.calculus.bump_function_findim from "leanprover-community/mathlib"@"fd5edc43dc4f10b85abfe544b88f82cf13c5f844" noncomputable section open Set Metric TopologicalSpace Function Asymptotics MeasureTheory FiniteDimensional ContinuousLinearMap Filter MeasureTheory.Measure Bornology open scoped Pointwise Topology NNReal Convolution variable {E : Type} [NormedAddCommGroup E] section variable [NormedSpace ℝ E] [FiniteDimensional ℝ E] theorem exists_smooth_tsupport_subset {s : Set E} {x : E} (hs : s ∈ 𝓝 x) : ∃ f : E → ℝ, tsupport f ⊆ s ∧ HasCompactSupport f ∧ ContDiff ℝ ⊤ f ∧ range f ⊆ Icc 0 1 ∧ f x = 1 := by obtain ⟨d : ℝ, d_pos : 0 < d, hd : Euclidean.closedBall x d ⊆ s⟩ := Euclidean.nhds_basis_closedBall.mem_iff.1 hs let c : ContDiffBump (toEuclidean x) := { rIn := d / 2 rOut := d rIn_pos := half_pos d_pos rIn_lt_rOut := half_lt_self d_pos } let f : E → ℝ := c ∘ toEuclidean have f_supp : f.support ⊆ Euclidean.ball x d := by intro y hy have : toEuclidean y ∈ Function.support c := by simpa only [Function.mem_support, Function.comp_apply, Ne] using hy rwa [c.support_eq] at this have f_tsupp : tsupport f ⊆ Euclidean.closedBall x d := by rw [tsupport, ← Euclidean.closure_ball _ d_pos.ne'] exact closure_mono f_supp refine ⟨f, f_tsupp.trans hd, ?_, ?_, ?_, ?_⟩ · refine isCompact_of_isClosed_isBounded isClosed_closure ?_ have : IsBounded (Euclidean.closedBall x d) := Euclidean.isCompact_closedBall.isBounded refine this.subset (Euclidean.isClosed_closedBall.closure_subset_iff.2 ?_) exact f_supp.trans Euclidean.ball_subset_closedBall · apply c.contDiff.comp exact ContinuousLinearEquiv.contDiff _ · rintro t ⟨y, rfl⟩ exact ⟨c.nonneg, c.le_one⟩ · apply c.one_of_mem_closedBall apply mem_closedBall_self exact (half_pos d_pos).le #align exists_smooth_tsupport_subset exists_smooth_tsupport_subset theorem IsOpen.exists_smooth_support_eq {s : Set E} (hs : IsOpen s) : ∃ f : E → ℝ, f.support = s ∧ ContDiff ℝ ⊤ f ∧ Set.range f ⊆ Set.Icc 0 1 := by rcases eq_empty_or_nonempty s with (rfl \| h's) · exact ⟨fun _ => 0, Function.support_zero, contDiff_const, by simp only [range_const, singleton_subset_iff, left_mem_Icc, zero_le_one]⟩ let ι := { f : E → ℝ // f.support ⊆ s ∧ HasCompactSupport f ∧ ContDiff ℝ ⊤ f ∧ range f ⊆ Icc 0 1 } obtain ⟨T, T_count, hT⟩ : ∃ T : Set ι, T.Countable ∧ ⋃ f ∈ T, support (f : E → ℝ) = s := by have : ⋃ f : ι, (f : E → ℝ).support = s := by refine Subset.antisymm (iUnion_subset fun f => f.2.1) ?_ intro x hx rcases exists_smooth_tsupport_subset (hs.mem_nhds hx) with ⟨f, hf⟩ let g : ι := ⟨f, (subset_tsupport f).trans hf.1, hf.2.1, hf.2.2.1, hf.2.2.2.1⟩ have : x ∈ support (g : E → ℝ) := by simp only [hf.2.2.2.2, Subtype.coe_mk, mem_support, Ne, one_ne_zero, not_false_iff] exact mem_iUnion_of_mem _ this simp_rw [← this] apply isOpen_iUnion_countable rintro ⟨f, hf⟩ exact hf.2.2.1.continuous.isOpen_support obtain ⟨g0, hg⟩ : ∃ g0 : ℕ → ι, T = range g0 := by apply Countable.exists_eq_range T_count rcases eq_empty_or_nonempty T with (rfl \| hT) · simp only [ι, iUnion_false, iUnion_empty] at hT simp only [← hT, mem_empty_iff_false, iUnion_of_empty, iUnion_empty, Set.not_nonempty_empty] at h's · exact hT let g : ℕ → E → ℝ := fun n => (g0 n).1 have g_s : ∀ n, support (g n) ⊆ s := fun n => (g0 n).2.1 have s_g : ∀ x ∈ s, ∃ n, x ∈ support (g n) := fun x hx ↦ by rw [← hT] at hx obtain ⟨i, iT, hi⟩ : ∃ i ∈ T, x ∈ support (i : E → ℝ) := by simpa only [mem_iUnion, exists_prop] using hx rw [hg, mem_range] at iT rcases iT with ⟨n, hn⟩ rw [← hn] at hi exact ⟨n, hi⟩ have g_smooth : ∀ n, ContDiff ℝ ⊤ (g n) := fun n => (g0 n).2.2.2.1 have g_comp_supp : ∀ n, HasCompactSupport (g n) := fun n => (g0 n).2.2.1 have g_nonneg : ∀ n x, 0 ≤ g n x := fun n x => ((g0 n).2.2.2.2 (mem_range_self x)).1 obtain ⟨δ, δpos, c, δc, c_lt⟩ : ∃ δ : ℕ → ℝ≥0, (∀ i : ℕ, 0 < δ i) ∧ ∃ c : NNReal, HasSum δ c ∧ c < 1 := NNReal.exists_pos_sum_of_countable one_ne_zero ℕ have : ∀ n : ℕ, ∃ r : ℝ, 0 < r ∧ ∀ i ≤ n, ∀ x, ‖iteratedFDeriv ℝ i (r • g n) x‖ ≤ δ n := by intro n have : ∀ i, ∃ R, ∀ x, ‖iteratedFDeriv ℝ i (fun x => g n x) x‖ ≤ R := by intro i have : BddAbove (range fun x => ‖iteratedFDeriv ℝ i (fun x : E => g n x) x‖) := by apply ((g_smooth n).continuous_iteratedFDeriv le_top).norm.bddAbove_range_of_hasCompactSupport apply HasCompactSupport.comp_left _ norm_zero apply (g_comp_supp n).iteratedFDeriv rcases this with ⟨R, hR⟩ exact ⟨R, fun x => hR (mem_range_self _)⟩ choose R hR using this let M := max (((Finset.range (n + 1)).image R).max' (by simp)) 1 have δnpos : 0 < δ n := δpos n have IR : ∀ i ≤ n, R i ≤ M := by intro i hi refine le_trans ?_ (le_max_left _ _) apply Finset.le_max' apply Finset.mem_image_of_mem -- Porting note: was -- simp only [Finset.mem_range] -- linarith simpa only [Finset.mem_range, Nat.lt_add_one_iff] refine ⟨M⁻¹ δ n, by positivity, fun i hi x => ?_⟩ calc ‖iteratedFDeriv ℝ i ((M⁻¹ * δ n) • g n) x‖ = ‖(M⁻¹ * δ n) • iteratedFDeriv ℝ i (g n) x‖ := by rw [iteratedFDeriv_const_smul_apply]; exact (g_smooth n).of_le le_top _ = M⁻¹ * δ n * ‖iteratedFDeriv ℝ i (g n) x‖ := by rw [norm_smul _ (iteratedFDeriv ℝ i (g n) x), Real.norm_of_nonneg]; positivity _ ≤ M⁻¹ * δ n * M := (mul_le_mul_of_nonneg_left ((hR i x).trans (IR i hi)) (by positivity)) _ = δ n := by field_simp choose r rpos hr using this have S : ∀ x, Summable fun n => (r n • g n) x := fun x ↦ by refine .of_nnnorm_bounded _ δc.summable fun n => ?_ rw [← NNReal.coe_le_coe, coe_nnnorm] simpa only [norm_iteratedFDeriv_zero] using hr n 0 (zero_le n) x refine ⟨fun x => ∑' n, (r n • g n) x, ?_, ?_, ?_⟩ · apply Subset.antisymm · intro x hx simp only [Pi.smul_apply, Algebra.id.smul_eq_mul, mem_support, Ne] at hx contrapose! hx have : ∀ n, g n x = 0 := by intro n contrapose! hx exact g_s n hx simp only [this, mul_zero, tsum_zero] · intro x hx obtain ⟨n, hn⟩ : ∃ n, x ∈ support (g n) := s_g x hx have I : 0 < r n * g n x := mul_pos (rpos n) (lt_of_le_of_ne (g_nonneg n x) (Ne.symm hn)) exact ne_of_gt (tsum_pos (S x) (fun i => mul_nonneg (rpos i).le (g_nonneg i x)) n I) · refine contDiff_tsum_of_eventually (fun n => (g_smooth n).const_smul (r n)) (fun k _ => (NNReal.hasSum_coe.2 δc).summable) ?_ intro i _ simp only [Nat.cofinite_eq_atTop, Pi.smul_apply, Algebra.id.smul_eq_mul, Filter.eventually_atTop, ge_iff_le] exact ⟨i, fun n hn x => hr _ _ hn _⟩ · rintro - ⟨y, rfl⟩ refine ⟨tsum_nonneg fun n => mul_nonneg (rpos n).le (g_nonneg n y), le_trans ?_ c_lt.le⟩ have A : HasSum (fun n => (δ n : ℝ)) c := NNReal.hasSum_coe.2 δc simp only [Pi.smul_apply, smul_eq_mul, NNReal.val_eq_coe, ← A.tsum_eq, ge_iff_le] apply tsum_le_tsum _ (S y) A.summable intro n apply (le_abs_self _).trans simpa only [norm_iteratedFDeriv_zero] using hr n 0 (zero_le n) y #align is_open.exists_smooth_support_eq IsOpen.exists_smooth_support_eq end section namespace ExistsContDiffBumpBase def φ : E → ℝ := (closedBall (0 : E) 1).indicator fun _ => (1 : ℝ) #align exists_cont_diff_bump_base.φ ExistsContDiffBumpBase.φ variable [NormedSpace ℝ E] [FiniteDimensional ℝ E] section HelperDefinitions variable (E) theorem u_exists : ∃ u : E → ℝ, ContDiff ℝ ⊤ u ∧ (∀ x, u x ∈ Icc (0 : ℝ) 1) ∧ support u = ball 0 1 ∧ ∀ x, u (-x) = u x := by have A : IsOpen (ball (0 : E) 1) := isOpen_ball obtain ⟨f, f_support, f_smooth, f_range⟩ : ∃ f : E → ℝ, f.support = ball (0 : E) 1 ∧ ContDiff ℝ ⊤ f ∧ Set.range f ⊆ Set.Icc 0 1 := A.exists_smooth_support_eq have B : ∀ x, f x ∈ Icc (0 : ℝ) 1 := fun x => f_range (mem_range_self x) refine ⟨fun x => (f x + f (-x)) / 2, ?_, ?_, ?_, ?_⟩ · exact (f_smooth.add (f_smooth.comp contDiff_neg)).div_const _ · intro x simp only [mem_Icc] constructor · linarith [(B x).1, (B (-x)).1] · linarith [(B x).2, (B (-x)).2] · refine support_eq_iff.2 ⟨fun x hx => ?_, fun x hx => ?_⟩ · apply ne_of_gt have : 0 < f x := by apply lt_of_le_of_ne (B x).1 (Ne.symm _) rwa [← f_support] at hx linarith [(B (-x)).1] · have I1 : x ∉ support f := by rwa [f_support] have I2 : -x ∉ support f := by rw [f_support] simpa using hx simp only [mem_support, Classical.not_not] at I1 I2 simp only [I1, I2, add_zero, zero_div] · intro x; simp only [add_comm, neg_neg] #align exists_cont_diff_bump_base.u_exists ExistsContDiffBumpBase.u_exists variable {E} def u (x : E) : ℝ := Classical.choose (u_exists E) x #align exists_cont_diff_bump_base.u ExistsContDiffBumpBase.u variable (E) theorem u_smooth : ContDiff ℝ ⊤ (u : E → ℝ) := (Classical.choose_spec (u_exists E)).1 #align exists_cont_diff_bump_base.u_smooth ExistsContDiffBumpBase.u_smooth theorem u_continuous : Continuous (u : E → ℝ) := (u_smooth E).continuous #align exists_cont_diff_bump_base.u_continuous ExistsContDiffBumpBase.u_continuous theorem u_support : support (u : E → ℝ) = ball 0 1 := (Classical.choose_spec (u_exists E)).2.2.1 #align exists_cont_diff_bump_base.u_support ExistsContDiffBumpBase.u_support theorem u_compact_support : HasCompactSupport (u : E → ℝ) := by rw [hasCompactSupport_def, u_support, closure_ball (0 : E) one_ne_zero] exact isCompact_closedBall _ _ #align exists_cont_diff_bump_base.u_compact_support ExistsContDiffBumpBase.u_compact_support variable {E} theorem u_nonneg (x : E) : 0 ≤ u x := ((Classical.choose_spec (u_exists E)).2.1 x).1 #align exists_cont_diff_bump_base.u_nonneg ExistsContDiffBumpBase.u_nonneg theorem u_le_one (x : E) : u x ≤ 1 := ((Classical.choose_spec (u_exists E)).2.1 x).2 #align exists_cont_diff_bump_base.u_le_one ExistsContDiffBumpBase.u_le_one theorem u_neg (x : E) : u (-x) = u x := (Classical.choose_spec (u_exists E)).2.2.2 x #align exists_cont_diff_bump_base.u_neg ExistsContDiffBumpBase.u_neg variable [MeasurableSpace E] [BorelSpace E] local notation "μ" => MeasureTheory.Measure.addHaar variable (E) theorem u_int_pos : 0 < ∫ x : E, u x ∂μ := by refine (integral_pos_iff_support_of_nonneg u_nonneg ?_).mpr ?_ · exact (u_continuous E).integrable_of_hasCompactSupport (u_compact_support E) · rw [u_support]; exact measure_ball_pos _ _ zero_lt_one #align exists_cont_diff_bump_base.u_int_pos ExistsContDiffBumpBase.u_int_pos variable {E} -- Porting note: `W` upper case set_option linter.uppercaseLean3 false def w (D : ℝ) (x : E) : ℝ := ((∫ x : E, u x ∂μ) * \|D\| ^ finrank ℝ E)⁻¹ • u (D⁻¹ • x) #align exists_cont_diff_bump_base.W ExistsContDiffBumpBase.w theorem w_def (D : ℝ) : (w D : E → ℝ) = fun x => ((∫ x : E, u x ∂μ) * \|D\| ^ finrank ℝ E)⁻¹ • u (D⁻¹ • x) := by ext1 x; rfl #align exists_cont_diff_bump_base.W_def ExistsContDiffBumpBase.w_def theorem w_nonneg (D : ℝ) (x : E) : 0 ≤ w D x := by apply mul_nonneg _ (u_nonneg _) apply inv_nonneg.2 apply mul_nonneg (u_int_pos E).le norm_cast apply pow_nonneg (abs_nonneg D) #align exists_cont_diff_bump_base.W_nonneg ExistsContDiffBumpBase.w_nonneg theorem w_mul_φ_nonneg (D : ℝ) (x y : E) : 0 ≤ w D y * φ (x - y) := mul_nonneg (w_nonneg D y) (indicator_nonneg (by simp only [zero_le_one, imp_true_iff]) _) #align exists_cont_diff_bump_base.W_mul_φ_nonneg ExistsContDiffBumpBase.w_mul_φ_nonneg variable (E) theorem w_integral {D : ℝ} (Dpos : 0 < D) : ∫ x : E, w D x ∂μ = 1 := by simp_rw [w, integral_smul] rw [integral_comp_inv_smul_of_nonneg μ (u : E → ℝ) Dpos.le, abs_of_nonneg Dpos.le, mul_comm] field_simp [(u_int_pos E).ne'] #align exists_cont_diff_bump_base.W_integral ExistsContDiffBumpBase.w_integral	Mathlib/Analysis/Calculus/BumpFunction/FiniteDimension.lean	331	339	theorem w_support {D : ℝ} (Dpos : 0 < D) : support (w D : E → ℝ) = ball 0 D := by	have B : D • ball (0 : E) 1 = ball 0 D := by rw [smul_unitBall Dpos.ne', Real.norm_of_nonneg Dpos.le] have C : D ^ finrank ℝ E ≠ 0 := by norm_cast exact pow_ne_zero _ Dpos.ne' simp only [w_def, Algebra.id.smul_eq_mul, support_mul, support_inv, univ_inter, support_comp_inv_smul₀ Dpos.ne', u_support, B, support_const (u_int_pos E).ne', support_const C, abs_of_nonneg Dpos.le]
import Mathlib.Algebra.Polynomial.Basic #align_import data.polynomial.monomial from "leanprover-community/mathlib"@"220f71ba506c8958c9b41bd82226b3d06b0991e8" noncomputable section namespace Polynomial open Polynomial universe u variable {R : Type u} {a b : R} {m n : ℕ} variable [Semiring R] {p q r : R[X]} theorem monomial_one_eq_iff [Nontrivial R] {i j : ℕ} : (monomial i 1 : R[X]) = monomial j 1 ↔ i = j := by -- Porting note: `ofFinsupp.injEq` is required. simp_rw [← ofFinsupp_single, ofFinsupp.injEq] exact AddMonoidAlgebra.of_injective.eq_iff #align polynomial.monomial_one_eq_iff Polynomial.monomial_one_eq_iff instance infinite [Nontrivial R] : Infinite R[X] := Infinite.of_injective (fun i => monomial i 1) fun m n h => by simpa [monomial_one_eq_iff] using h #align polynomial.infinite Polynomial.infinite theorem card_support_le_one_iff_monomial {f : R[X]} : Finset.card f.support ≤ 1 ↔ ∃ n a, f = monomial n a := by constructor · intro H rw [Finset.card_le_one_iff_subset_singleton] at H rcases H with ⟨n, hn⟩ refine ⟨n, f.coeff n, ?_⟩ ext i by_cases hi : i = n · simp [hi, coeff_monomial] · have : f.coeff i = 0 := by rw [← not_mem_support_iff] exact fun hi' => hi (Finset.mem_singleton.1 (hn hi')) simp [this, Ne.symm hi, coeff_monomial] · rintro ⟨n, a, rfl⟩ rw [← Finset.card_singleton n] apply Finset.card_le_card exact support_monomial' _ _ #align polynomial.card_support_le_one_iff_monomial Polynomial.card_support_le_one_iff_monomial	Mathlib/Algebra/Polynomial/Monomial.lean	59	80	theorem ringHom_ext {S} [Semiring S] {f g : R[X] →+* S} (h₁ : ∀ a, f (C a) = g (C a)) (h₂ : f X = g X) : f = g := by	set f' := f.comp (toFinsuppIso R).symm.toRingHom with hf' set g' := g.comp (toFinsuppIso R).symm.toRingHom with hg' have A : f' = g' := by -- Porting note: Was `ext; simp [..]; simpa [..] using h₂`. ext : 1 · ext simp [f', g', h₁, RingEquiv.toRingHom_eq_coe] · refine MonoidHom.ext_mnat ?_ simpa [RingEquiv.toRingHom_eq_coe] using h₂ have B : f = f'.comp (toFinsuppIso R) := by rw [hf', RingHom.comp_assoc] ext x simp only [RingEquiv.toRingHom_eq_coe, RingEquiv.symm_apply_apply, Function.comp_apply, RingHom.coe_comp, RingEquiv.coe_toRingHom] have C' : g = g'.comp (toFinsuppIso R) := by rw [hg', RingHom.comp_assoc] ext x simp only [RingEquiv.toRingHom_eq_coe, RingEquiv.symm_apply_apply, Function.comp_apply, RingHom.coe_comp, RingEquiv.coe_toRingHom] rw [B, C', A]
import Mathlib.Data.Nat.Prime import Mathlib.Data.PNat.Basic #align_import data.pnat.prime from "leanprover-community/mathlib"@"09597669f02422ed388036273d8848119699c22f" namespace PNat open Nat def gcd (n m : ℕ+) : ℕ+ := ⟨Nat.gcd (n : ℕ) (m : ℕ), Nat.gcd_pos_of_pos_left (m : ℕ) n.pos⟩ #align pnat.gcd PNat.gcd def lcm (n m : ℕ+) : ℕ+ := ⟨Nat.lcm (n : ℕ) (m : ℕ), by let h := mul_pos n.pos m.pos rw [← gcd_mul_lcm (n : ℕ) (m : ℕ), mul_comm] at h exact pos_of_dvd_of_pos (Dvd.intro (Nat.gcd (n : ℕ) (m : ℕ)) rfl) h⟩ #align pnat.lcm PNat.lcm @[simp, norm_cast] theorem gcd_coe (n m : ℕ+) : (gcd n m : ℕ) = Nat.gcd n m := rfl #align pnat.gcd_coe PNat.gcd_coe @[simp, norm_cast] theorem lcm_coe (n m : ℕ+) : (lcm n m : ℕ) = Nat.lcm n m := rfl #align pnat.lcm_coe PNat.lcm_coe theorem gcd_dvd_left (n m : ℕ+) : gcd n m ∣ n := dvd_iff.2 (Nat.gcd_dvd_left (n : ℕ) (m : ℕ)) #align pnat.gcd_dvd_left PNat.gcd_dvd_left theorem gcd_dvd_right (n m : ℕ+) : gcd n m ∣ m := dvd_iff.2 (Nat.gcd_dvd_right (n : ℕ) (m : ℕ)) #align pnat.gcd_dvd_right PNat.gcd_dvd_right theorem dvd_gcd {m n k : ℕ+} (hm : k ∣ m) (hn : k ∣ n) : k ∣ gcd m n := dvd_iff.2 (Nat.dvd_gcd (dvd_iff.1 hm) (dvd_iff.1 hn)) #align pnat.dvd_gcd PNat.dvd_gcd theorem dvd_lcm_left (n m : ℕ+) : n ∣ lcm n m := dvd_iff.2 (Nat.dvd_lcm_left (n : ℕ) (m : ℕ)) #align pnat.dvd_lcm_left PNat.dvd_lcm_left theorem dvd_lcm_right (n m : ℕ+) : m ∣ lcm n m := dvd_iff.2 (Nat.dvd_lcm_right (n : ℕ) (m : ℕ)) #align pnat.dvd_lcm_right PNat.dvd_lcm_right theorem lcm_dvd {m n k : ℕ+} (hm : m ∣ k) (hn : n ∣ k) : lcm m n ∣ k := dvd_iff.2 (@Nat.lcm_dvd (m : ℕ) (n : ℕ) (k : ℕ) (dvd_iff.1 hm) (dvd_iff.1 hn)) #align pnat.lcm_dvd PNat.lcm_dvd theorem gcd_mul_lcm (n m : ℕ+) : gcd n m * lcm n m = n * m := Subtype.eq (Nat.gcd_mul_lcm (n : ℕ) (m : ℕ)) #align pnat.gcd_mul_lcm PNat.gcd_mul_lcm theorem eq_one_of_lt_two {n : ℕ+} : n < 2 → n = 1 := by intro h; apply le_antisymm; swap · apply PNat.one_le · exact PNat.lt_add_one_iff.1 h #align pnat.eq_one_of_lt_two PNat.eq_one_of_lt_two section Coprime def Coprime (m n : ℕ+) : Prop := m.gcd n = 1 #align pnat.coprime PNat.Coprime @[simp, norm_cast] theorem coprime_coe {m n : ℕ+} : Nat.Coprime ↑m ↑n ↔ m.Coprime n := by unfold Nat.Coprime Coprime rw [← coe_inj] simp #align pnat.coprime_coe PNat.coprime_coe theorem Coprime.mul {k m n : ℕ+} : m.Coprime k → n.Coprime k → (m * n).Coprime k := by repeat rw [← coprime_coe] rw [mul_coe] apply Nat.Coprime.mul #align pnat.coprime.mul PNat.Coprime.mul theorem Coprime.mul_right {k m n : ℕ+} : k.Coprime m → k.Coprime n → k.Coprime (m * n) := by repeat rw [← coprime_coe] rw [mul_coe] apply Nat.Coprime.mul_right #align pnat.coprime.mul_right PNat.Coprime.mul_right theorem gcd_comm {m n : ℕ+} : m.gcd n = n.gcd m := by apply eq simp only [gcd_coe] apply Nat.gcd_comm #align pnat.gcd_comm PNat.gcd_comm theorem gcd_eq_left_iff_dvd {m n : ℕ+} : m ∣ n ↔ m.gcd n = m := by rw [dvd_iff] rw [Nat.gcd_eq_left_iff_dvd] rw [← coe_inj] simp #align pnat.gcd_eq_left_iff_dvd PNat.gcd_eq_left_iff_dvd theorem gcd_eq_right_iff_dvd {m n : ℕ+} : m ∣ n ↔ n.gcd m = m := by rw [gcd_comm] apply gcd_eq_left_iff_dvd #align pnat.gcd_eq_right_iff_dvd PNat.gcd_eq_right_iff_dvd theorem Coprime.gcd_mul_left_cancel (m : ℕ+) {n k : ℕ+} : k.Coprime n → (k * m).gcd n = m.gcd n := by intro h; apply eq; simp only [gcd_coe, mul_coe] apply Nat.Coprime.gcd_mul_left_cancel; simpa #align pnat.coprime.gcd_mul_left_cancel PNat.Coprime.gcd_mul_left_cancel theorem Coprime.gcd_mul_right_cancel (m : ℕ+) {n k : ℕ+} : k.Coprime n → (m * k).gcd n = m.gcd n := by rw [mul_comm]; apply Coprime.gcd_mul_left_cancel #align pnat.coprime.gcd_mul_right_cancel PNat.Coprime.gcd_mul_right_cancel theorem Coprime.gcd_mul_left_cancel_right (m : ℕ+) {n k : ℕ+} : k.Coprime m → m.gcd (k * n) = m.gcd n := by intro h; iterate 2 rw [gcd_comm]; symm; apply Coprime.gcd_mul_left_cancel _ h #align pnat.coprime.gcd_mul_left_cancel_right PNat.Coprime.gcd_mul_left_cancel_right theorem Coprime.gcd_mul_right_cancel_right (m : ℕ+) {n k : ℕ+} : k.Coprime m → m.gcd (n * k) = m.gcd n := by rw [mul_comm]; apply Coprime.gcd_mul_left_cancel_right #align pnat.coprime.gcd_mul_right_cancel_right PNat.Coprime.gcd_mul_right_cancel_right @[simp] theorem one_gcd {n : ℕ+} : gcd 1 n = 1 := by rw [← gcd_eq_left_iff_dvd] apply one_dvd #align pnat.one_gcd PNat.one_gcd @[simp] theorem gcd_one {n : ℕ+} : gcd n 1 = 1 := by rw [gcd_comm] apply one_gcd #align pnat.gcd_one PNat.gcd_one @[symm] theorem Coprime.symm {m n : ℕ+} : m.Coprime n → n.Coprime m := by unfold Coprime rw [gcd_comm] simp #align pnat.coprime.symm PNat.Coprime.symm @[simp] theorem one_coprime {n : ℕ+} : (1 : ℕ+).Coprime n := one_gcd #align pnat.one_coprime PNat.one_coprime @[simp] theorem coprime_one {n : ℕ+} : n.Coprime 1 := Coprime.symm one_coprime #align pnat.coprime_one PNat.coprime_one theorem Coprime.coprime_dvd_left {m k n : ℕ+} : m ∣ k → k.Coprime n → m.Coprime n := by rw [dvd_iff] repeat rw [← coprime_coe] apply Nat.Coprime.coprime_dvd_left #align pnat.coprime.coprime_dvd_left PNat.Coprime.coprime_dvd_left theorem Coprime.factor_eq_gcd_left {a b m n : ℕ+} (cop : m.Coprime n) (am : a ∣ m) (bn : b ∣ n) : a = (a * b).gcd m := by rw [gcd_eq_left_iff_dvd] at am conv_lhs => rw [← am] rw [eq_comm] apply Coprime.gcd_mul_right_cancel a apply Coprime.coprime_dvd_left bn cop.symm #align pnat.coprime.factor_eq_gcd_left PNat.Coprime.factor_eq_gcd_left theorem Coprime.factor_eq_gcd_right {a b m n : ℕ+} (cop : m.Coprime n) (am : a ∣ m) (bn : b ∣ n) : a = (b * a).gcd m := by rw [mul_comm]; apply Coprime.factor_eq_gcd_left cop am bn #align pnat.coprime.factor_eq_gcd_right PNat.Coprime.factor_eq_gcd_right theorem Coprime.factor_eq_gcd_left_right {a b m n : ℕ+} (cop : m.Coprime n) (am : a ∣ m) (bn : b ∣ n) : a = m.gcd (a * b) := by rw [gcd_comm]; apply Coprime.factor_eq_gcd_left cop am bn #align pnat.coprime.factor_eq_gcd_left_right PNat.Coprime.factor_eq_gcd_left_right theorem Coprime.factor_eq_gcd_right_right {a b m n : ℕ+} (cop : m.Coprime n) (am : a ∣ m) (bn : b ∣ n) : a = m.gcd (b * a) := by rw [gcd_comm] apply Coprime.factor_eq_gcd_right cop am bn #align pnat.coprime.factor_eq_gcd_right_right PNat.Coprime.factor_eq_gcd_right_right theorem Coprime.gcd_mul (k : ℕ+) {m n : ℕ+} (h : m.Coprime n) : k.gcd (m * n) = k.gcd m * k.gcd n := by rw [← coprime_coe] at h; apply eq simp only [gcd_coe, mul_coe]; apply Nat.Coprime.gcd_mul k h #align pnat.coprime.gcd_mul PNat.Coprime.gcd_mul	Mathlib/Data/PNat/Prime.lean	308	313	theorem gcd_eq_left {m n : ℕ+} : m ∣ n → m.gcd n = m := by	rw [dvd_iff] intro h apply eq simp only [gcd_coe] apply Nat.gcd_eq_left h
import Mathlib.Order.Filter.Basic import Mathlib.Topology.Bases import Mathlib.Data.Set.Accumulate import Mathlib.Topology.Bornology.Basic import Mathlib.Topology.LocallyFinite open Set Filter Topology TopologicalSpace Classical Function universe u v variable {X : Type u} {Y : Type v} {ι : Type} variable [TopologicalSpace X] [TopologicalSpace Y] {s t : Set X} -- compact sets section Compact lemma IsCompact.exists_clusterPt (hs : IsCompact s) {f : Filter X} [NeBot f] (hf : f ≤ 𝓟 s) : ∃ x ∈ s, ClusterPt x f := hs hf lemma IsCompact.exists_mapClusterPt {ι : Type} (hs : IsCompact s) {f : Filter ι} [NeBot f] {u : ι → X} (hf : Filter.map u f ≤ 𝓟 s) : ∃ x ∈ s, MapClusterPt x f u := hs hf theorem IsCompact.compl_mem_sets (hs : IsCompact s) {f : Filter X} (hf : ∀ x ∈ s, sᶜ ∈ 𝓝 x ⊓ f) : sᶜ ∈ f := by contrapose! hf simp only [not_mem_iff_inf_principal_compl, compl_compl, inf_assoc] at hf ⊢ exact @hs _ hf inf_le_right #align is_compact.compl_mem_sets IsCompact.compl_mem_sets theorem IsCompact.compl_mem_sets_of_nhdsWithin (hs : IsCompact s) {f : Filter X} (hf : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, tᶜ ∈ f) : sᶜ ∈ f := by refine hs.compl_mem_sets fun x hx => ?_ rcases hf x hx with ⟨t, ht, hst⟩ replace ht := mem_inf_principal.1 ht apply mem_inf_of_inter ht hst rintro x ⟨h₁, h₂⟩ hs exact h₂ (h₁ hs) #align is_compact.compl_mem_sets_of_nhds_within IsCompact.compl_mem_sets_of_nhdsWithin @[elab_as_elim] theorem IsCompact.induction_on (hs : IsCompact s) {p : Set X → Prop} (he : p ∅) (hmono : ∀ ⦃s t⦄, s ⊆ t → p t → p s) (hunion : ∀ ⦃s t⦄, p s → p t → p (s ∪ t)) (hnhds : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, p t) : p s := by let f : Filter X := comk p he (fun _t ht _s hsub ↦ hmono hsub ht) (fun _s hs _t ht ↦ hunion hs ht) have : sᶜ ∈ f := hs.compl_mem_sets_of_nhdsWithin (by simpa [f] using hnhds) rwa [← compl_compl s] #align is_compact.induction_on IsCompact.induction_on theorem IsCompact.inter_right (hs : IsCompact s) (ht : IsClosed t) : IsCompact (s ∩ t) := by intro f hnf hstf obtain ⟨x, hsx, hx⟩ : ∃ x ∈ s, ClusterPt x f := hs (le_trans hstf (le_principal_iff.2 inter_subset_left)) have : x ∈ t := ht.mem_of_nhdsWithin_neBot <\| hx.mono <\| le_trans hstf (le_principal_iff.2 inter_subset_right) exact ⟨x, ⟨hsx, this⟩, hx⟩ #align is_compact.inter_right IsCompact.inter_right theorem IsCompact.inter_left (ht : IsCompact t) (hs : IsClosed s) : IsCompact (s ∩ t) := inter_comm t s ▸ ht.inter_right hs #align is_compact.inter_left IsCompact.inter_left theorem IsCompact.diff (hs : IsCompact s) (ht : IsOpen t) : IsCompact (s \ t) := hs.inter_right (isClosed_compl_iff.mpr ht) #align is_compact.diff IsCompact.diff theorem IsCompact.of_isClosed_subset (hs : IsCompact s) (ht : IsClosed t) (h : t ⊆ s) : IsCompact t := inter_eq_self_of_subset_right h ▸ hs.inter_right ht #align is_compact_of_is_closed_subset IsCompact.of_isClosed_subset theorem IsCompact.image_of_continuousOn {f : X → Y} (hs : IsCompact s) (hf : ContinuousOn f s) : IsCompact (f '' s) := by intro l lne ls have : NeBot (l.comap f ⊓ 𝓟 s) := comap_inf_principal_neBot_of_image_mem lne (le_principal_iff.1 ls) obtain ⟨x, hxs, hx⟩ : ∃ x ∈ s, ClusterPt x (l.comap f ⊓ 𝓟 s) := @hs _ this inf_le_right haveI := hx.neBot use f x, mem_image_of_mem f hxs have : Tendsto f (𝓝 x ⊓ (comap f l ⊓ 𝓟 s)) (𝓝 (f x) ⊓ l) := by convert (hf x hxs).inf (@tendsto_comap _ _ f l) using 1 rw [nhdsWithin] ac_rfl exact this.neBot #align is_compact.image_of_continuous_on IsCompact.image_of_continuousOn theorem IsCompact.image {f : X → Y} (hs : IsCompact s) (hf : Continuous f) : IsCompact (f '' s) := hs.image_of_continuousOn hf.continuousOn #align is_compact.image IsCompact.image theorem IsCompact.adherence_nhdset {f : Filter X} (hs : IsCompact s) (hf₂ : f ≤ 𝓟 s) (ht₁ : IsOpen t) (ht₂ : ∀ x ∈ s, ClusterPt x f → x ∈ t) : t ∈ f := Classical.by_cases mem_of_eq_bot fun (this : f ⊓ 𝓟 tᶜ ≠ ⊥) => let ⟨x, hx, (hfx : ClusterPt x <\| f ⊓ 𝓟 tᶜ)⟩ := @hs _ ⟨this⟩ <\| inf_le_of_left_le hf₂ have : x ∈ t := ht₂ x hx hfx.of_inf_left have : tᶜ ∩ t ∈ 𝓝[tᶜ] x := inter_mem_nhdsWithin _ (IsOpen.mem_nhds ht₁ this) have A : 𝓝[tᶜ] x = ⊥ := empty_mem_iff_bot.1 <\| compl_inter_self t ▸ this have : 𝓝[tᶜ] x ≠ ⊥ := hfx.of_inf_right.ne absurd A this #align is_compact.adherence_nhdset IsCompact.adherence_nhdset theorem isCompact_iff_ultrafilter_le_nhds : IsCompact s ↔ ∀ f : Ultrafilter X, ↑f ≤ 𝓟 s → ∃ x ∈ s, ↑f ≤ 𝓝 x := by refine (forall_neBot_le_iff ?_).trans ?_ · rintro f g hle ⟨x, hxs, hxf⟩ exact ⟨x, hxs, hxf.mono hle⟩ · simp only [Ultrafilter.clusterPt_iff] #align is_compact_iff_ultrafilter_le_nhds isCompact_iff_ultrafilter_le_nhds alias ⟨IsCompact.ultrafilter_le_nhds, _⟩ := isCompact_iff_ultrafilter_le_nhds #align is_compact.ultrafilter_le_nhds IsCompact.ultrafilter_le_nhds theorem isCompact_iff_ultrafilter_le_nhds' : IsCompact s ↔ ∀ f : Ultrafilter X, s ∈ f → ∃ x ∈ s, ↑f ≤ 𝓝 x := by simp only [isCompact_iff_ultrafilter_le_nhds, le_principal_iff, Ultrafilter.mem_coe] alias ⟨IsCompact.ultrafilter_le_nhds', _⟩ := isCompact_iff_ultrafilter_le_nhds' lemma IsCompact.le_nhds_of_unique_clusterPt (hs : IsCompact s) {l : Filter X} {y : X} (hmem : s ∈ l) (h : ∀ x ∈ s, ClusterPt x l → x = y) : l ≤ 𝓝 y := by refine le_iff_ultrafilter.2 fun f hf ↦ ?_ rcases hs.ultrafilter_le_nhds' f (hf hmem) with ⟨x, hxs, hx⟩ convert ← hx exact h x hxs (.mono (.of_le_nhds hx) hf) lemma IsCompact.tendsto_nhds_of_unique_mapClusterPt {l : Filter Y} {y : X} {f : Y → X} (hs : IsCompact s) (hmem : ∀ᶠ x in l, f x ∈ s) (h : ∀ x ∈ s, MapClusterPt x l f → x = y) : Tendsto f l (𝓝 y) := hs.le_nhds_of_unique_clusterPt (mem_map.2 hmem) h theorem IsCompact.elim_directed_cover {ι : Type v} [hι : Nonempty ι] (hs : IsCompact s) (U : ι → Set X) (hUo : ∀ i, IsOpen (U i)) (hsU : s ⊆ ⋃ i, U i) (hdU : Directed (· ⊆ ·) U) : ∃ i, s ⊆ U i := hι.elim fun i₀ => IsCompact.induction_on hs ⟨i₀, empty_subset _⟩ (fun _ _ hs ⟨i, hi⟩ => ⟨i, hs.trans hi⟩) (fun _ _ ⟨i, hi⟩ ⟨j, hj⟩ => let ⟨k, hki, hkj⟩ := hdU i j ⟨k, union_subset (Subset.trans hi hki) (Subset.trans hj hkj)⟩) fun _x hx => let ⟨i, hi⟩ := mem_iUnion.1 (hsU hx) ⟨U i, mem_nhdsWithin_of_mem_nhds (IsOpen.mem_nhds (hUo i) hi), i, Subset.refl _⟩ #align is_compact.elim_directed_cover IsCompact.elim_directed_cover theorem IsCompact.elim_finite_subcover {ι : Type v} (hs : IsCompact s) (U : ι → Set X) (hUo : ∀ i, IsOpen (U i)) (hsU : s ⊆ ⋃ i, U i) : ∃ t : Finset ι, s ⊆ ⋃ i ∈ t, U i := hs.elim_directed_cover _ (fun _ => isOpen_biUnion fun i _ => hUo i) (iUnion_eq_iUnion_finset U ▸ hsU) (directed_of_isDirected_le fun _ _ h => biUnion_subset_biUnion_left h) #align is_compact.elim_finite_subcover IsCompact.elim_finite_subcover lemma IsCompact.elim_nhds_subcover_nhdsSet' (hs : IsCompact s) (U : ∀ x ∈ s, Set X) (hU : ∀ x hx, U x hx ∈ 𝓝 x) : ∃ t : Finset s, (⋃ x ∈ t, U x.1 x.2) ∈ 𝓝ˢ s := by rcases hs.elim_finite_subcover (fun x : s ↦ interior (U x x.2)) (fun _ ↦ isOpen_interior) fun x hx ↦ mem_iUnion.2 ⟨⟨x, hx⟩, mem_interior_iff_mem_nhds.2 <\| hU _ _⟩ with ⟨t, hst⟩ refine ⟨t, mem_nhdsSet_iff_forall.2 fun x hx ↦ ?_⟩ rcases mem_iUnion₂.1 (hst hx) with ⟨y, hyt, hy⟩ refine mem_of_superset ?_ (subset_biUnion_of_mem hyt) exact mem_interior_iff_mem_nhds.1 hy lemma IsCompact.elim_nhds_subcover_nhdsSet (hs : IsCompact s) {U : X → Set X} (hU : ∀ x ∈ s, U x ∈ 𝓝 x) : ∃ t : Finset X, (∀ x ∈ t, x ∈ s) ∧ (⋃ x ∈ t, U x) ∈ 𝓝ˢ s := let ⟨t, ht⟩ := hs.elim_nhds_subcover_nhdsSet' (fun x _ => U x) hU ⟨t.image (↑), fun x hx => let ⟨y, _, hyx⟩ := Finset.mem_image.1 hx hyx ▸ y.2, by rwa [Finset.set_biUnion_finset_image]⟩ theorem IsCompact.elim_nhds_subcover' (hs : IsCompact s) (U : ∀ x ∈ s, Set X) (hU : ∀ x (hx : x ∈ s), U x ‹x ∈ s› ∈ 𝓝 x) : ∃ t : Finset s, s ⊆ ⋃ x ∈ t, U (x : s) x.2 := (hs.elim_nhds_subcover_nhdsSet' U hU).imp fun _ ↦ subset_of_mem_nhdsSet #align is_compact.elim_nhds_subcover' IsCompact.elim_nhds_subcover' theorem IsCompact.elim_nhds_subcover (hs : IsCompact s) (U : X → Set X) (hU : ∀ x ∈ s, U x ∈ 𝓝 x) : ∃ t : Finset X, (∀ x ∈ t, x ∈ s) ∧ s ⊆ ⋃ x ∈ t, U x := (hs.elim_nhds_subcover_nhdsSet hU).imp fun _ h ↦ h.imp_right subset_of_mem_nhdsSet #align is_compact.elim_nhds_subcover IsCompact.elim_nhds_subcover theorem IsCompact.disjoint_nhdsSet_left {l : Filter X} (hs : IsCompact s) : Disjoint (𝓝ˢ s) l ↔ ∀ x ∈ s, Disjoint (𝓝 x) l := by refine ⟨fun h x hx => h.mono_left <\| nhds_le_nhdsSet hx, fun H => ?_⟩ choose! U hxU hUl using fun x hx => (nhds_basis_opens x).disjoint_iff_left.1 (H x hx) choose hxU hUo using hxU rcases hs.elim_nhds_subcover U fun x hx => (hUo x hx).mem_nhds (hxU x hx) with ⟨t, hts, hst⟩ refine (hasBasis_nhdsSet _).disjoint_iff_left.2 ⟨⋃ x ∈ t, U x, ⟨isOpen_biUnion fun x hx => hUo x (hts x hx), hst⟩, ?_⟩ rw [compl_iUnion₂, biInter_finset_mem] exact fun x hx => hUl x (hts x hx) #align is_compact.disjoint_nhds_set_left IsCompact.disjoint_nhdsSet_left theorem IsCompact.disjoint_nhdsSet_right {l : Filter X} (hs : IsCompact s) : Disjoint l (𝓝ˢ s) ↔ ∀ x ∈ s, Disjoint l (𝓝 x) := by simpa only [disjoint_comm] using hs.disjoint_nhdsSet_left #align is_compact.disjoint_nhds_set_right IsCompact.disjoint_nhdsSet_right -- Porting note (#11215): TODO: reformulate using `Disjoint` theorem IsCompact.elim_directed_family_closed {ι : Type v} [hι : Nonempty ι] (hs : IsCompact s) (t : ι → Set X) (htc : ∀ i, IsClosed (t i)) (hst : (s ∩ ⋂ i, t i) = ∅) (hdt : Directed (· ⊇ ·) t) : ∃ i : ι, s ∩ t i = ∅ := let ⟨t, ht⟩ := hs.elim_directed_cover (compl ∘ t) (fun i => (htc i).isOpen_compl) (by simpa only [subset_def, not_forall, eq_empty_iff_forall_not_mem, mem_iUnion, exists_prop, mem_inter_iff, not_and, iff_self_iff, mem_iInter, mem_compl_iff] using hst) (hdt.mono_comp _ fun _ _ => compl_subset_compl.mpr) ⟨t, by simpa only [subset_def, not_forall, eq_empty_iff_forall_not_mem, mem_iUnion, exists_prop, mem_inter_iff, not_and, iff_self_iff, mem_iInter, mem_compl_iff] using ht⟩ #align is_compact.elim_directed_family_closed IsCompact.elim_directed_family_closed -- Porting note (#11215): TODO: reformulate using `Disjoint` theorem IsCompact.elim_finite_subfamily_closed {ι : Type v} (hs : IsCompact s) (t : ι → Set X) (htc : ∀ i, IsClosed (t i)) (hst : (s ∩ ⋂ i, t i) = ∅) : ∃ u : Finset ι, (s ∩ ⋂ i ∈ u, t i) = ∅ := hs.elim_directed_family_closed _ (fun t ↦ isClosed_biInter fun _ _ ↦ htc _) (by rwa [← iInter_eq_iInter_finset]) (directed_of_isDirected_le fun _ _ h ↦ biInter_subset_biInter_left h) #align is_compact.elim_finite_subfamily_closed IsCompact.elim_finite_subfamily_closed theorem LocallyFinite.finite_nonempty_inter_compact {f : ι → Set X} (hf : LocallyFinite f) (hs : IsCompact s) : { i \| (f i ∩ s).Nonempty }.Finite := by choose U hxU hUf using hf rcases hs.elim_nhds_subcover U fun x _ => hxU x with ⟨t, -, hsU⟩ refine (t.finite_toSet.biUnion fun x _ => hUf x).subset ?_ rintro i ⟨x, hx⟩ rcases mem_iUnion₂.1 (hsU hx.2) with ⟨c, hct, hcx⟩ exact mem_biUnion hct ⟨x, hx.1, hcx⟩ #align locally_finite.finite_nonempty_inter_compact LocallyFinite.finite_nonempty_inter_compact theorem IsCompact.inter_iInter_nonempty {ι : Type v} (hs : IsCompact s) (t : ι → Set X) (htc : ∀ i, IsClosed (t i)) (hst : ∀ u : Finset ι, (s ∩ ⋂ i ∈ u, t i).Nonempty) : (s ∩ ⋂ i, t i).Nonempty := by contrapose! hst exact hs.elim_finite_subfamily_closed t htc hst #align is_compact.inter_Inter_nonempty IsCompact.inter_iInter_nonempty theorem IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed {ι : Type v} [hι : Nonempty ι] (t : ι → Set X) (htd : Directed (· ⊇ ·) t) (htn : ∀ i, (t i).Nonempty) (htc : ∀ i, IsCompact (t i)) (htcl : ∀ i, IsClosed (t i)) : (⋂ i, t i).Nonempty := by let i₀ := hι.some suffices (t i₀ ∩ ⋂ i, t i).Nonempty by rwa [inter_eq_right.mpr (iInter_subset _ i₀)] at this simp only [nonempty_iff_ne_empty] at htn ⊢ apply mt ((htc i₀).elim_directed_family_closed t htcl) push_neg simp only [← nonempty_iff_ne_empty] at htn ⊢ refine ⟨htd, fun i => ?_⟩ rcases htd i₀ i with ⟨j, hji₀, hji⟩ exact (htn j).mono (subset_inter hji₀ hji) #align is_compact.nonempty_Inter_of_directed_nonempty_compact_closed IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed @[deprecated (since := "2024-02-28")] alias IsCompact.nonempty_iInter_of_directed_nonempty_compact_closed := IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed theorem IsCompact.nonempty_sInter_of_directed_nonempty_isCompact_isClosed {S : Set (Set X)} [hS : Nonempty S] (hSd : DirectedOn (· ⊇ ·) S) (hSn : ∀ U ∈ S, U.Nonempty) (hSc : ∀ U ∈ S, IsCompact U) (hScl : ∀ U ∈ S, IsClosed U) : (⋂₀ S).Nonempty := by rw [sInter_eq_iInter] exact IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed _ (DirectedOn.directed_val hSd) (fun i ↦ hSn i i.2) (fun i ↦ hSc i i.2) (fun i ↦ hScl i i.2) theorem IsCompact.nonempty_iInter_of_sequence_nonempty_isCompact_isClosed (t : ℕ → Set X) (htd : ∀ i, t (i + 1) ⊆ t i) (htn : ∀ i, (t i).Nonempty) (ht0 : IsCompact (t 0)) (htcl : ∀ i, IsClosed (t i)) : (⋂ i, t i).Nonempty := have tmono : Antitone t := antitone_nat_of_succ_le htd have htd : Directed (· ⊇ ·) t := tmono.directed_ge have : ∀ i, t i ⊆ t 0 := fun i => tmono <\| zero_le i have htc : ∀ i, IsCompact (t i) := fun i => ht0.of_isClosed_subset (htcl i) (this i) IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed t htd htn htc htcl #align is_compact.nonempty_Inter_of_sequence_nonempty_compact_closed IsCompact.nonempty_iInter_of_sequence_nonempty_isCompact_isClosed @[deprecated (since := "2024-02-28")] alias IsCompact.nonempty_iInter_of_sequence_nonempty_compact_closed := IsCompact.nonempty_iInter_of_sequence_nonempty_isCompact_isClosed theorem IsCompact.elim_finite_subcover_image {b : Set ι} {c : ι → Set X} (hs : IsCompact s) (hc₁ : ∀ i ∈ b, IsOpen (c i)) (hc₂ : s ⊆ ⋃ i ∈ b, c i) : ∃ b', b' ⊆ b ∧ Set.Finite b' ∧ s ⊆ ⋃ i ∈ b', c i := by simp only [Subtype.forall', biUnion_eq_iUnion] at hc₁ hc₂ rcases hs.elim_finite_subcover (fun i => c i : b → Set X) hc₁ hc₂ with ⟨d, hd⟩ refine ⟨Subtype.val '' d.toSet, ?_, d.finite_toSet.image _, ?_⟩ · simp · rwa [biUnion_image] #align is_compact.elim_finite_subcover_image IsCompact.elim_finite_subcover_imageₓ theorem isCompact_of_finite_subcover (h : ∀ {ι : Type u} (U : ι → Set X), (∀ i, IsOpen (U i)) → (s ⊆ ⋃ i, U i) → ∃ t : Finset ι, s ⊆ ⋃ i ∈ t, U i) : IsCompact s := fun f hf hfs => by contrapose! h simp only [ClusterPt, not_neBot, ← disjoint_iff, SetCoe.forall', (nhds_basis_opens _).disjoint_iff_left] at h choose U hU hUf using h refine ⟨s, U, fun x => (hU x).2, fun x hx => mem_iUnion.2 ⟨⟨x, hx⟩, (hU _).1⟩, fun t ht => ?_⟩ refine compl_not_mem (le_principal_iff.1 hfs) ?_ refine mem_of_superset ((biInter_finset_mem t).2 fun x _ => hUf x) ?_ rw [subset_compl_comm, compl_iInter₂] simpa only [compl_compl] #align is_compact_of_finite_subcover isCompact_of_finite_subcover -- Porting note (#11215): TODO: reformulate using `Disjoint` theorem isCompact_of_finite_subfamily_closed (h : ∀ {ι : Type u} (t : ι → Set X), (∀ i, IsClosed (t i)) → (s ∩ ⋂ i, t i) = ∅ → ∃ u : Finset ι, (s ∩ ⋂ i ∈ u, t i) = ∅) : IsCompact s := isCompact_of_finite_subcover fun U hUo hsU => by rw [← disjoint_compl_right_iff_subset, compl_iUnion, disjoint_iff] at hsU rcases h (fun i => (U i)ᶜ) (fun i => (hUo _).isClosed_compl) hsU with ⟨t, ht⟩ refine ⟨t, ?_⟩ rwa [← disjoint_compl_right_iff_subset, compl_iUnion₂, disjoint_iff] #align is_compact_of_finite_subfamily_closed isCompact_of_finite_subfamily_closed theorem isCompact_iff_finite_subcover : IsCompact s ↔ ∀ {ι : Type u} (U : ι → Set X), (∀ i, IsOpen (U i)) → (s ⊆ ⋃ i, U i) → ∃ t : Finset ι, s ⊆ ⋃ i ∈ t, U i := ⟨fun hs => hs.elim_finite_subcover, isCompact_of_finite_subcover⟩ #align is_compact_iff_finite_subcover isCompact_iff_finite_subcover theorem isCompact_iff_finite_subfamily_closed : IsCompact s ↔ ∀ {ι : Type u} (t : ι → Set X), (∀ i, IsClosed (t i)) → (s ∩ ⋂ i, t i) = ∅ → ∃ u : Finset ι, (s ∩ ⋂ i ∈ u, t i) = ∅ := ⟨fun hs => hs.elim_finite_subfamily_closed, isCompact_of_finite_subfamily_closed⟩ #align is_compact_iff_finite_subfamily_closed isCompact_iff_finite_subfamily_closed theorem IsCompact.mem_nhdsSet_prod_of_forall {K : Set X} {l : Filter Y} {s : Set (X × Y)} (hK : IsCompact K) (hs : ∀ x ∈ K, s ∈ 𝓝 x ×ˢ l) : s ∈ (𝓝ˢ K) ×ˢ l := by refine hK.induction_on (by simp) (fun t t' ht hs ↦ ?_) (fun t t' ht ht' ↦ ?_) fun x hx ↦ ?_ · exact prod_mono (nhdsSet_mono ht) le_rfl hs · simp [sup_prod, *] · rcases ((nhds_basis_opens _).prod l.basis_sets).mem_iff.1 (hs x hx) with ⟨⟨u, v⟩, ⟨⟨hx, huo⟩, hv⟩, hs⟩ refine ⟨u, nhdsWithin_le_nhds (huo.mem_nhds hx), mem_of_superset ?_ hs⟩ exact prod_mem_prod (huo.mem_nhdsSet.2 Subset.rfl) hv theorem IsCompact.nhdsSet_prod_eq_biSup {K : Set X} (hK : IsCompact K) (l : Filter Y) : (𝓝ˢ K) ×ˢ l = ⨆ x ∈ K, 𝓝 x ×ˢ l := le_antisymm (fun s hs ↦ hK.mem_nhdsSet_prod_of_forall <\| by simpa using hs) (iSup₂_le fun x hx ↦ prod_mono (nhds_le_nhdsSet hx) le_rfl) theorem IsCompact.prod_nhdsSet_eq_biSup {K : Set Y} (hK : IsCompact K) (l : Filter X) : l ×ˢ (𝓝ˢ K) = ⨆ y ∈ K, l ×ˢ 𝓝 y := by simp only [prod_comm (f := l), hK.nhdsSet_prod_eq_biSup, map_iSup] theorem IsCompact.mem_prod_nhdsSet_of_forall {K : Set Y} {l : Filter X} {s : Set (X × Y)} (hK : IsCompact K) (hs : ∀ y ∈ K, s ∈ l ×ˢ 𝓝 y) : s ∈ l ×ˢ 𝓝ˢ K := (hK.prod_nhdsSet_eq_biSup l).symm ▸ by simpa using hs -- TODO: Is there a way to prove directly the `inf` version and then deduce the `Prod` one ? -- That would seem a bit more natural. theorem IsCompact.nhdsSet_inf_eq_biSup {K : Set X} (hK : IsCompact K) (l : Filter X) : (𝓝ˢ K) ⊓ l = ⨆ x ∈ K, 𝓝 x ⊓ l := by have : ∀ f : Filter X, f ⊓ l = comap (fun x ↦ (x, x)) (f ×ˢ l) := fun f ↦ by simpa only [comap_prod] using congrArg₂ (· ⊓ ·) comap_id.symm comap_id.symm simp_rw [this, ← comap_iSup, hK.nhdsSet_prod_eq_biSup] theorem IsCompact.inf_nhdsSet_eq_biSup {K : Set X} (hK : IsCompact K) (l : Filter X) : l ⊓ (𝓝ˢ K) = ⨆ x ∈ K, l ⊓ 𝓝 x := by simp only [inf_comm l, hK.nhdsSet_inf_eq_biSup] theorem IsCompact.mem_nhdsSet_inf_of_forall {K : Set X} {l : Filter X} {s : Set X} (hK : IsCompact K) (hs : ∀ x ∈ K, s ∈ 𝓝 x ⊓ l) : s ∈ (𝓝ˢ K) ⊓ l := (hK.nhdsSet_inf_eq_biSup l).symm ▸ by simpa using hs theorem IsCompact.mem_inf_nhdsSet_of_forall {K : Set X} {l : Filter X} {s : Set X} (hK : IsCompact K) (hs : ∀ y ∈ K, s ∈ l ⊓ 𝓝 y) : s ∈ l ⊓ 𝓝ˢ K := (hK.inf_nhdsSet_eq_biSup l).symm ▸ by simpa using hs theorem IsCompact.eventually_forall_of_forall_eventually {x₀ : X} {K : Set Y} (hK : IsCompact K) {P : X → Y → Prop} (hP : ∀ y ∈ K, ∀ᶠ z : X × Y in 𝓝 (x₀, y), P z.1 z.2) : ∀ᶠ x in 𝓝 x₀, ∀ y ∈ K, P x y := by simp only [nhds_prod_eq, ← eventually_iSup, ← hK.prod_nhdsSet_eq_biSup] at hP exact hP.curry.mono fun _ h ↦ h.self_of_nhdsSet #align is_compact.eventually_forall_of_forall_eventually IsCompact.eventually_forall_of_forall_eventually @[simp] theorem isCompact_empty : IsCompact (∅ : Set X) := fun _f hnf hsf => Not.elim hnf.ne <\| empty_mem_iff_bot.1 <\| le_principal_iff.1 hsf #align is_compact_empty isCompact_empty @[simp] theorem isCompact_singleton {x : X} : IsCompact ({x} : Set X) := fun f hf hfa => ⟨x, rfl, ClusterPt.of_le_nhds' (hfa.trans <\| by simpa only [principal_singleton] using pure_le_nhds x) hf⟩ #align is_compact_singleton isCompact_singleton theorem Set.Subsingleton.isCompact (hs : s.Subsingleton) : IsCompact s := Subsingleton.induction_on hs isCompact_empty fun _ => isCompact_singleton #align set.subsingleton.is_compact Set.Subsingleton.isCompact -- Porting note: golfed a proof instead of fixing it theorem Set.Finite.isCompact_biUnion {s : Set ι} {f : ι → Set X} (hs : s.Finite) (hf : ∀ i ∈ s, IsCompact (f i)) : IsCompact (⋃ i ∈ s, f i) := isCompact_iff_ultrafilter_le_nhds'.2 fun l hl => by rw [Ultrafilter.finite_biUnion_mem_iff hs] at hl rcases hl with ⟨i, his, hi⟩ rcases (hf i his).ultrafilter_le_nhds _ (le_principal_iff.2 hi) with ⟨x, hxi, hlx⟩ exact ⟨x, mem_iUnion₂.2 ⟨i, his, hxi⟩, hlx⟩ #align set.finite.is_compact_bUnion Set.Finite.isCompact_biUnion theorem Finset.isCompact_biUnion (s : Finset ι) {f : ι → Set X} (hf : ∀ i ∈ s, IsCompact (f i)) : IsCompact (⋃ i ∈ s, f i) := s.finite_toSet.isCompact_biUnion hf #align finset.is_compact_bUnion Finset.isCompact_biUnion theorem isCompact_accumulate {K : ℕ → Set X} (hK : ∀ n, IsCompact (K n)) (n : ℕ) : IsCompact (Accumulate K n) := (finite_le_nat n).isCompact_biUnion fun k _ => hK k #align is_compact_accumulate isCompact_accumulate -- Porting note (#10756): new lemma	Mathlib/Topology/Compactness/Compact.lean	498	500	theorem Set.Finite.isCompact_sUnion {S : Set (Set X)} (hf : S.Finite) (hc : ∀ s ∈ S, IsCompact s) : IsCompact (⋃₀ S) := by	rw [sUnion_eq_biUnion]; exact hf.isCompact_biUnion hc
import Mathlib.FieldTheory.IsAlgClosed.AlgebraicClosure import Mathlib.FieldTheory.Galois universe u v w open scoped Classical Polynomial open Polynomial variable (k : Type u) [Field k] (K : Type v) [Field K] class IsSepClosed : Prop where splits_of_separable : ∀ p : k[X], p.Separable → (p.Splits <\| RingHom.id k) instance IsSepClosed.of_isAlgClosed [IsAlgClosed k] : IsSepClosed k := ⟨fun p _ ↦ IsAlgClosed.splits p⟩ variable {k} {K}	Mathlib/FieldTheory/IsSepClosed.lean	78	80	theorem IsSepClosed.splits_codomain [IsSepClosed K] {f : k →+* K} (p : k[X]) (h : p.Separable) : p.Splits f := by	convert IsSepClosed.splits_of_separable (p.map f) (Separable.map h); simp [splits_map_iff]
import Mathlib.CategoryTheory.Sites.Whiskering import Mathlib.CategoryTheory.Sites.Plus #align_import category_theory.sites.compatible_plus from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a" noncomputable section namespace CategoryTheory.GrothendieckTopology open CategoryTheory Limits Opposite universe w₁ w₂ v u variable {C : Type u} [Category.{v} C] (J : GrothendieckTopology C) variable {D : Type w₁} [Category.{max v u} D] variable {E : Type w₂} [Category.{max v u} E] variable (F : D ⥤ E) variable [∀ (α β : Type max v u) (fst snd : β → α), HasLimitsOfShape (WalkingMulticospan fst snd) D] variable [∀ (α β : Type max v u) (fst snd : β → α), HasLimitsOfShape (WalkingMulticospan fst snd) E] variable [∀ (X : C) (W : J.Cover X) (P : Cᵒᵖ ⥤ D), PreservesLimit (W.index P).multicospan F] variable (P : Cᵒᵖ ⥤ D) def diagramCompIso (X : C) : J.diagram P X ⋙ F ≅ J.diagram (P ⋙ F) X := NatIso.ofComponents (fun W => by refine ?_ ≪≫ HasLimit.isoOfNatIso (W.unop.multicospanComp _ _).symm refine (isLimitOfPreserves F (limit.isLimit _)).conePointUniqueUpToIso (limit.isLimit _)) (by intro A B f -- Porting note: this used to work with `ext` -- See https://github.com/leanprover-community/mathlib4/issues/5229 apply Multiequalizer.hom_ext dsimp simp only [Functor.mapCone_π_app, Multiequalizer.multifork_π_app_left, Iso.symm_hom, Multiequalizer.lift_ι, eqToHom_refl, Category.comp_id, limit.conePointUniqueUpToIso_hom_comp, GrothendieckTopology.Cover.multicospanComp_hom_inv_left, HasLimit.isoOfNatIso_hom_π, Category.assoc] simp only [← F.map_comp, limit.lift_π, Multifork.ofι_π_app, implies_true]) #align category_theory.grothendieck_topology.diagram_comp_iso CategoryTheory.GrothendieckTopology.diagramCompIso @[reassoc (attr := simp)] theorem diagramCompIso_hom_ι (X : C) (W : (J.Cover X)ᵒᵖ) (i : W.unop.Arrow) : (J.diagramCompIso F P X).hom.app W ≫ Multiequalizer.ι ((unop W).index (P ⋙ F)) i = F.map (Multiequalizer.ι _ _) := by delta diagramCompIso dsimp simp #align category_theory.grothendieck_topology.diagram_comp_iso_hom_ι CategoryTheory.GrothendieckTopology.diagramCompIso_hom_ι variable [∀ X : C, HasColimitsOfShape (J.Cover X)ᵒᵖ D] variable [∀ X : C, HasColimitsOfShape (J.Cover X)ᵒᵖ E] variable [∀ X : C, PreservesColimitsOfShape (J.Cover X)ᵒᵖ F] def plusCompIso : J.plusObj P ⋙ F ≅ J.plusObj (P ⋙ F) := NatIso.ofComponents (fun X => by refine ?_ ≪≫ HasColimit.isoOfNatIso (J.diagramCompIso F P X.unop) refine (isColimitOfPreserves F (colimit.isColimit (J.diagram P (unop X)))).coconePointUniqueUpToIso (colimit.isColimit _)) (by intro X Y f apply (isColimitOfPreserves F (colimit.isColimit (J.diagram P X.unop))).hom_ext intro W dsimp [plusObj, plusMap] simp only [Functor.map_comp, Category.assoc] slice_rhs 1 2 => erw [(isColimitOfPreserves F (colimit.isColimit (J.diagram P X.unop))).fac] slice_lhs 1 3 => simp only [← F.map_comp] dsimp [colimMap, IsColimit.map, colimit.pre] simp only [colimit.ι_desc_assoc, colimit.ι_desc] dsimp [Cocones.precompose] simp only [Category.assoc, colimit.ι_desc] dsimp [Cocone.whisker] rw [F.map_comp] simp only [Category.assoc] slice_lhs 2 3 => erw [(isColimitOfPreserves F (colimit.isColimit (J.diagram P Y.unop))).fac] dsimp simp only [HasColimit.isoOfNatIso_ι_hom_assoc, GrothendieckTopology.diagramPullback_app, colimit.ι_pre, HasColimit.isoOfNatIso_ι_hom, ι_colimMap_assoc] simp only [← Category.assoc] dsimp congr 1 ext dsimp simp only [Category.assoc] erw [Multiequalizer.lift_ι, diagramCompIso_hom_ι, diagramCompIso_hom_ι, ← F.map_comp, Multiequalizer.lift_ι]) #align category_theory.grothendieck_topology.plus_comp_iso CategoryTheory.GrothendieckTopology.plusCompIso @[reassoc (attr := simp)] theorem ι_plusCompIso_hom (X) (W) : F.map (colimit.ι _ W) ≫ (J.plusCompIso F P).hom.app X = (J.diagramCompIso F P X.unop).hom.app W ≫ colimit.ι _ W := by delta diagramCompIso plusCompIso simp only [IsColimit.descCoconeMorphism_hom, IsColimit.uniqueUpToIso_hom, Cocones.forget_map, Iso.trans_hom, NatIso.ofComponents_hom_app, Functor.mapIso_hom, ← Category.assoc] erw [(isColimitOfPreserves F (colimit.isColimit (J.diagram P (unop X)))).fac] simp only [Category.assoc, HasLimit.isoOfNatIso_hom_π, Iso.symm_hom, Cover.multicospanComp_hom_inv_left, eqToHom_refl, Category.comp_id, limit.conePointUniqueUpToIso_hom_comp, Functor.mapCone_π_app, Multiequalizer.multifork_π_app_left, Multiequalizer.lift_ι, Functor.map_comp, eq_self_iff_true, Category.assoc, Iso.trans_hom, Iso.cancel_iso_hom_left, NatIso.ofComponents_hom_app, colimit.cocone_ι, Category.assoc, HasColimit.isoOfNatIso_ι_hom] #align category_theory.grothendieck_topology.ι_plus_comp_iso_hom CategoryTheory.GrothendieckTopology.ι_plusCompIso_hom @[reassoc (attr := simp)] theorem plusCompIso_whiskerLeft {F G : D ⥤ E} (η : F ⟶ G) (P : Cᵒᵖ ⥤ D) [∀ X : C, PreservesColimitsOfShape (J.Cover X)ᵒᵖ F] [∀ (X : C) (W : J.Cover X) (P : Cᵒᵖ ⥤ D), PreservesLimit (W.index P).multicospan F] [∀ X : C, PreservesColimitsOfShape (J.Cover X)ᵒᵖ G] [∀ (X : C) (W : J.Cover X) (P : Cᵒᵖ ⥤ D), PreservesLimit (W.index P).multicospan G] : whiskerLeft _ η ≫ (J.plusCompIso G P).hom = (J.plusCompIso F P).hom ≫ J.plusMap (whiskerLeft _ η) := by ext X apply (isColimitOfPreserves F (colimit.isColimit (J.diagram P X.unop))).hom_ext intro W dsimp [plusObj, plusMap] simp only [ι_plusCompIso_hom, ι_colimMap, whiskerLeft_app, ι_plusCompIso_hom_assoc, NatTrans.naturality_assoc, GrothendieckTopology.diagramNatTrans_app] simp only [← Category.assoc] congr 1 -- Porting note: this used to work with `ext` -- See https://github.com/leanprover-community/mathlib4/issues/5229 apply Multiequalizer.hom_ext intro a dsimp simp -- Porting note: in mathlib3 `simp` managed to apply this. erw [η.naturality] #align category_theory.grothendieck_topology.plus_comp_iso_whisker_left CategoryTheory.GrothendieckTopology.plusCompIso_whiskerLeft @[simps! hom_app inv_app] def plusFunctorWhiskerLeftIso (P : Cᵒᵖ ⥤ D) [∀ (F : D ⥤ E) (X : C), PreservesColimitsOfShape (J.Cover X)ᵒᵖ F] [∀ (F : D ⥤ E) (X : C) (W : J.Cover X) (P : Cᵒᵖ ⥤ D), PreservesLimit (W.index P).multicospan F] : (whiskeringLeft _ _ E).obj (J.plusObj P) ≅ (whiskeringLeft _ _ _).obj P ⋙ J.plusFunctor E := NatIso.ofComponents (fun _ => plusCompIso _ _ _) @fun _ _ _ => plusCompIso_whiskerLeft _ _ _ #align category_theory.grothendieck_topology.plus_functor_whisker_left_iso CategoryTheory.GrothendieckTopology.plusFunctorWhiskerLeftIso @[reassoc (attr := simp)] theorem plusCompIso_whiskerRight {P Q : Cᵒᵖ ⥤ D} (η : P ⟶ Q) : whiskerRight (J.plusMap η) F ≫ (J.plusCompIso F Q).hom = (J.plusCompIso F P).hom ≫ J.plusMap (whiskerRight η F) := by ext X apply (isColimitOfPreserves F (colimit.isColimit (J.diagram P X.unop))).hom_ext intro W dsimp [plusObj, plusMap] simp only [ι_colimMap, whiskerRight_app, ι_plusCompIso_hom_assoc, GrothendieckTopology.diagramNatTrans_app] simp only [← Category.assoc, ← F.map_comp] dsimp [colimMap, IsColimit.map] simp only [colimit.ι_desc] dsimp [Cocones.precompose] simp only [Functor.map_comp, Category.assoc, ι_plusCompIso_hom] simp only [← Category.assoc] congr 1 -- Porting note: this used to work with `ext` -- See https://github.com/leanprover-community/mathlib4/issues/5229 apply Multiequalizer.hom_ext intro a dsimp simp only [diagramCompIso_hom_ι_assoc, Multiequalizer.lift_ι, diagramCompIso_hom_ι, Category.assoc] simp only [← F.map_comp, Multiequalizer.lift_ι] #align category_theory.grothendieck_topology.plus_comp_iso_whisker_right CategoryTheory.GrothendieckTopology.plusCompIso_whiskerRight @[simps! hom_app inv_app] def plusFunctorWhiskerRightIso : J.plusFunctor D ⋙ (whiskeringRight _ _ _).obj F ≅ (whiskeringRight _ _ _).obj F ⋙ J.plusFunctor E := NatIso.ofComponents (fun _ => J.plusCompIso _ _) @fun _ _ _ => plusCompIso_whiskerRight _ _ _ #align category_theory.grothendieck_topology.plus_functor_whisker_right_iso CategoryTheory.GrothendieckTopology.plusFunctorWhiskerRightIso @[reassoc (attr := simp)]	Mathlib/CategoryTheory/Sites/CompatiblePlus.lean	203	213	theorem whiskerRight_toPlus_comp_plusCompIso_hom : whiskerRight (J.toPlus _) _ ≫ (J.plusCompIso F P).hom = J.toPlus _ := by	ext dsimp [toPlus] simp only [ι_plusCompIso_hom, Functor.map_comp, Category.assoc] simp only [← Category.assoc] congr 1 -- See https://github.com/leanprover-community/mathlib4/issues/5229 apply Multiequalizer.hom_ext; intro a rw [Category.assoc, diagramCompIso_hom_ι, ← F.map_comp] simp only [unop_op, limit.lift_π, Multifork.ofι_π_app, Functor.comp_obj, Functor.comp_map]

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