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 |
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import Batteries.Tactic.Init
import Batteries.Tactic.Alias
import Batteries.Tactic.Lint.Misc
instance {f : α → β} [DecidablePred p] : DecidablePred (p ∘ f) :=
inferInstanceAs <| DecidablePred fun x => p (f x)
@[deprecated] alias proofIrrel := proof_irrel
theorem Function.id_def : @id α = fun x => x := rfl
alias ⟨forall_not_of_not_exists, not_exists_of_forall_not⟩ := not_exists
protected alias ⟨Decidable.exists_not_of_not_forall, _⟩ := Decidable.not_forall
theorem heq_iff_eq : HEq a b ↔ a = b := ⟨eq_of_heq, heq_of_eq⟩
@[simp] theorem eq_rec_constant {α : Sort _} {a a' : α} {β : Sort _} (y : β) (h : a = a') :
(@Eq.rec α a (fun α _ => β) y a' h) = y := by cases h; rfl
theorem congrArg₂ (f : α → β → γ) {x x' : α} {y y' : β}
(hx : x = x') (hy : y = y') : f x y = f x' y' := by subst hx hy; rfl
theorem congrFun₂ {β : α → Sort _} {γ : ∀ a, β a → Sort _}
{f g : ∀ a b, γ a b} (h : f = g) (a : α) (b : β a) :
f a b = g a b :=
congrFun (congrFun h _) _
theorem congrFun₃ {β : α → Sort _} {γ : ∀ a, β a → Sort _} {δ : ∀ a b, γ a b → Sort _}
{f g : ∀ a b c, δ a b c} (h : f = g) (a : α) (b : β a) (c : γ a b) :
f a b c = g a b c :=
congrFun₂ (congrFun h _) _ _
theorem funext₂ {β : α → Sort _} {γ : ∀ a, β a → Sort _}
{f g : ∀ a b, γ a b} (h : ∀ a b, f a b = g a b) : f = g :=
funext fun _ => funext <| h _
theorem funext₃ {β : α → Sort _} {γ : ∀ a, β a → Sort _} {δ : ∀ a b, γ a b → Sort _}
{f g : ∀ a b c, δ a b c} (h : ∀ a b c, f a b c = g a b c) : f = g :=
funext fun _ => funext₂ <| h _
theorem Function.funext_iff {β : α → Sort u} {f₁ f₂ : ∀ x : α, β x} : f₁ = f₂ ↔ ∀ a, f₁ a = f₂ a :=
⟨congrFun, funext⟩
theorem ne_of_apply_ne {α β : Sort _} (f : α → β) {x y : α} : f x ≠ f y → x ≠ y :=
mt <| congrArg _
protected theorem Eq.congr (h₁ : x₁ = y₁) (h₂ : x₂ = y₂) : x₁ = x₂ ↔ y₁ = y₂ := by
subst h₁; subst h₂; rfl
theorem Eq.congr_left {x y z : α} (h : x = y) : x = z ↔ y = z := by rw [h]
theorem Eq.congr_right {x y z : α} (h : x = y) : z = x ↔ z = y := by rw [h]
alias congr_arg := congrArg
alias congr_arg₂ := congrArg₂
alias congr_fun := congrFun
alias congr_fun₂ := congrFun₂
alias congr_fun₃ := congrFun₃
theorem heq_of_cast_eq : ∀ (e : α = β) (_ : cast e a = a'), HEq a a'
| rfl, rfl => .rfl
theorem cast_eq_iff_heq : cast e a = a' ↔ HEq a a' :=
⟨heq_of_cast_eq _, fun h => by cases h; rfl⟩
| .lake/packages/batteries/Batteries/Logic.lean | 88 | 91 | theorem eqRec_eq_cast {α : Sort _} {a : α} {motive : (a' : α) → a = a' → Sort _}
(x : motive a (rfl : a = a)) {a' : α} (e : a = a') :
@Eq.rec α a motive x a' e = cast (e ▸ rfl) x := by |
subst e; rfl
|
import Mathlib.Algebra.Order.BigOperators.Group.Finset
import Mathlib.Data.Nat.Factors
import Mathlib.Order.Interval.Finset.Nat
#align_import number_theory.divisors from "leanprover-community/mathlib"@"e8638a0fcaf73e4500469f368ef9494e495099b3"
open scoped Classical
open Finset
namespace Nat
variable (n : ℕ)
def divisors : Finset ℕ :=
Finset.filter (fun x : ℕ => x ∣ n) (Finset.Ico 1 (n + 1))
#align nat.divisors Nat.divisors
def properDivisors : Finset ℕ :=
Finset.filter (fun x : ℕ => x ∣ n) (Finset.Ico 1 n)
#align nat.proper_divisors Nat.properDivisors
def divisorsAntidiagonal : Finset (ℕ × ℕ) :=
Finset.filter (fun x => x.fst * x.snd = n) (Ico 1 (n + 1) ×ˢ Ico 1 (n + 1))
#align nat.divisors_antidiagonal Nat.divisorsAntidiagonal
variable {n}
@[simp]
theorem filter_dvd_eq_divisors (h : n ≠ 0) : (Finset.range n.succ).filter (· ∣ n) = n.divisors := by
ext
simp only [divisors, mem_filter, mem_range, mem_Ico, and_congr_left_iff, iff_and_self]
exact fun ha _ => succ_le_iff.mpr (pos_of_dvd_of_pos ha h.bot_lt)
#align nat.filter_dvd_eq_divisors Nat.filter_dvd_eq_divisors
@[simp]
theorem filter_dvd_eq_properDivisors (h : n ≠ 0) :
(Finset.range n).filter (· ∣ n) = n.properDivisors := by
ext
simp only [properDivisors, mem_filter, mem_range, mem_Ico, and_congr_left_iff, iff_and_self]
exact fun ha _ => succ_le_iff.mpr (pos_of_dvd_of_pos ha h.bot_lt)
#align nat.filter_dvd_eq_proper_divisors Nat.filter_dvd_eq_properDivisors
theorem properDivisors.not_self_mem : ¬n ∈ properDivisors n := by simp [properDivisors]
#align nat.proper_divisors.not_self_mem Nat.properDivisors.not_self_mem
@[simp]
theorem mem_properDivisors {m : ℕ} : n ∈ properDivisors m ↔ n ∣ m ∧ n < m := by
rcases eq_or_ne m 0 with (rfl | hm); · simp [properDivisors]
simp only [and_comm, ← filter_dvd_eq_properDivisors hm, mem_filter, mem_range]
#align nat.mem_proper_divisors Nat.mem_properDivisors
theorem insert_self_properDivisors (h : n ≠ 0) : insert n (properDivisors n) = divisors n := by
rw [divisors, properDivisors, Ico_succ_right_eq_insert_Ico (one_le_iff_ne_zero.2 h),
Finset.filter_insert, if_pos (dvd_refl n)]
#align nat.insert_self_proper_divisors Nat.insert_self_properDivisors
theorem cons_self_properDivisors (h : n ≠ 0) :
cons n (properDivisors n) properDivisors.not_self_mem = divisors n := by
rw [cons_eq_insert, insert_self_properDivisors h]
#align nat.cons_self_proper_divisors Nat.cons_self_properDivisors
@[simp]
theorem mem_divisors {m : ℕ} : n ∈ divisors m ↔ n ∣ m ∧ m ≠ 0 := by
rcases eq_or_ne m 0 with (rfl | hm); · simp [divisors]
simp only [hm, Ne, not_false_iff, and_true_iff, ← filter_dvd_eq_divisors hm, mem_filter,
mem_range, and_iff_right_iff_imp, Nat.lt_succ_iff]
exact le_of_dvd hm.bot_lt
#align nat.mem_divisors Nat.mem_divisors
theorem one_mem_divisors : 1 ∈ divisors n ↔ n ≠ 0 := by simp
#align nat.one_mem_divisors Nat.one_mem_divisors
theorem mem_divisors_self (n : ℕ) (h : n ≠ 0) : n ∈ n.divisors :=
mem_divisors.2 ⟨dvd_rfl, h⟩
#align nat.mem_divisors_self Nat.mem_divisors_self
theorem dvd_of_mem_divisors {m : ℕ} (h : n ∈ divisors m) : n ∣ m := by
cases m
· apply dvd_zero
· simp [mem_divisors.1 h]
#align nat.dvd_of_mem_divisors Nat.dvd_of_mem_divisors
@[simp]
theorem mem_divisorsAntidiagonal {x : ℕ × ℕ} :
x ∈ divisorsAntidiagonal n ↔ x.fst * x.snd = n ∧ n ≠ 0 := by
simp only [divisorsAntidiagonal, Finset.mem_Ico, Ne, Finset.mem_filter, Finset.mem_product]
rw [and_comm]
apply and_congr_right
rintro rfl
constructor <;> intro h
· contrapose! h
simp [h]
· rw [Nat.lt_add_one_iff, Nat.lt_add_one_iff]
rw [mul_eq_zero, not_or] at h
simp only [succ_le_of_lt (Nat.pos_of_ne_zero h.1), succ_le_of_lt (Nat.pos_of_ne_zero h.2),
true_and_iff]
exact
⟨Nat.le_mul_of_pos_right _ (Nat.pos_of_ne_zero h.2),
Nat.le_mul_of_pos_left _ (Nat.pos_of_ne_zero h.1)⟩
#align nat.mem_divisors_antidiagonal Nat.mem_divisorsAntidiagonal
lemma ne_zero_of_mem_divisorsAntidiagonal {p : ℕ × ℕ} (hp : p ∈ n.divisorsAntidiagonal) :
p.1 ≠ 0 ∧ p.2 ≠ 0 := by
obtain ⟨hp₁, hp₂⟩ := Nat.mem_divisorsAntidiagonal.mp hp
exact mul_ne_zero_iff.mp (hp₁.symm ▸ hp₂)
lemma left_ne_zero_of_mem_divisorsAntidiagonal {p : ℕ × ℕ} (hp : p ∈ n.divisorsAntidiagonal) :
p.1 ≠ 0 :=
(ne_zero_of_mem_divisorsAntidiagonal hp).1
lemma right_ne_zero_of_mem_divisorsAntidiagonal {p : ℕ × ℕ} (hp : p ∈ n.divisorsAntidiagonal) :
p.2 ≠ 0 :=
(ne_zero_of_mem_divisorsAntidiagonal hp).2
theorem divisor_le {m : ℕ} : n ∈ divisors m → n ≤ m := by
cases' m with m
· simp
· simp only [mem_divisors, Nat.succ_ne_zero m, and_true_iff, Ne, not_false_iff]
exact Nat.le_of_dvd (Nat.succ_pos m)
#align nat.divisor_le Nat.divisor_le
theorem divisors_subset_of_dvd {m : ℕ} (hzero : n ≠ 0) (h : m ∣ n) : divisors m ⊆ divisors n :=
Finset.subset_iff.2 fun _x hx => Nat.mem_divisors.mpr ⟨(Nat.mem_divisors.mp hx).1.trans h, hzero⟩
#align nat.divisors_subset_of_dvd Nat.divisors_subset_of_dvd
theorem divisors_subset_properDivisors {m : ℕ} (hzero : n ≠ 0) (h : m ∣ n) (hdiff : m ≠ n) :
divisors m ⊆ properDivisors n := by
apply Finset.subset_iff.2
intro x hx
exact
Nat.mem_properDivisors.2
⟨(Nat.mem_divisors.1 hx).1.trans h,
lt_of_le_of_lt (divisor_le hx)
(lt_of_le_of_ne (divisor_le (Nat.mem_divisors.2 ⟨h, hzero⟩)) hdiff)⟩
#align nat.divisors_subset_proper_divisors Nat.divisors_subset_properDivisors
lemma divisors_filter_dvd_of_dvd {n m : ℕ} (hn : n ≠ 0) (hm : m ∣ n) :
(n.divisors.filter (· ∣ m)) = m.divisors := by
ext k
simp_rw [mem_filter, mem_divisors]
exact ⟨fun ⟨_, hkm⟩ ↦ ⟨hkm, ne_zero_of_dvd_ne_zero hn hm⟩, fun ⟨hk, _⟩ ↦ ⟨⟨hk.trans hm, hn⟩, hk⟩⟩
@[simp]
theorem divisors_zero : divisors 0 = ∅ := by
ext
simp
#align nat.divisors_zero Nat.divisors_zero
@[simp]
theorem properDivisors_zero : properDivisors 0 = ∅ := by
ext
simp
#align nat.proper_divisors_zero Nat.properDivisors_zero
@[simp]
lemma nonempty_divisors : (divisors n).Nonempty ↔ n ≠ 0 :=
⟨fun ⟨m, hm⟩ hn ↦ by simp [hn] at hm, fun hn ↦ ⟨1, one_mem_divisors.2 hn⟩⟩
@[simp]
lemma divisors_eq_empty : divisors n = ∅ ↔ n = 0 :=
not_nonempty_iff_eq_empty.symm.trans nonempty_divisors.not_left
theorem properDivisors_subset_divisors : properDivisors n ⊆ divisors n :=
filter_subset_filter _ <| Ico_subset_Ico_right n.le_succ
#align nat.proper_divisors_subset_divisors Nat.properDivisors_subset_divisors
@[simp]
theorem divisors_one : divisors 1 = {1} := by
ext
simp
#align nat.divisors_one Nat.divisors_one
@[simp]
theorem properDivisors_one : properDivisors 1 = ∅ := by rw [properDivisors, Ico_self, filter_empty]
#align nat.proper_divisors_one Nat.properDivisors_one
theorem pos_of_mem_divisors {m : ℕ} (h : m ∈ n.divisors) : 0 < m := by
cases m
· rw [mem_divisors, zero_dvd_iff (a := n)] at h
cases h.2 h.1
apply Nat.succ_pos
#align nat.pos_of_mem_divisors Nat.pos_of_mem_divisors
theorem pos_of_mem_properDivisors {m : ℕ} (h : m ∈ n.properDivisors) : 0 < m :=
pos_of_mem_divisors (properDivisors_subset_divisors h)
#align nat.pos_of_mem_proper_divisors Nat.pos_of_mem_properDivisors
theorem one_mem_properDivisors_iff_one_lt : 1 ∈ n.properDivisors ↔ 1 < n := by
rw [mem_properDivisors, and_iff_right (one_dvd _)]
#align nat.one_mem_proper_divisors_iff_one_lt Nat.one_mem_properDivisors_iff_one_lt
@[simp]
lemma sup_divisors_id (n : ℕ) : n.divisors.sup id = n := by
refine le_antisymm (Finset.sup_le fun _ ↦ divisor_le) ?_
rcases Decidable.eq_or_ne n 0 with rfl | hn
· apply zero_le
· exact Finset.le_sup (f := id) <| mem_divisors_self n hn
lemma one_lt_of_mem_properDivisors {m n : ℕ} (h : m ∈ n.properDivisors) : 1 < n :=
lt_of_le_of_lt (pos_of_mem_properDivisors h) (mem_properDivisors.1 h).2
lemma one_lt_div_of_mem_properDivisors {m n : ℕ} (h : m ∈ n.properDivisors) :
1 < n / m := by
obtain ⟨h_dvd, h_lt⟩ := mem_properDivisors.mp h
rwa [Nat.lt_div_iff_mul_lt h_dvd, mul_one]
lemma mem_properDivisors_iff_exists {m n : ℕ} (hn : n ≠ 0) :
m ∈ n.properDivisors ↔ ∃ k > 1, n = m * k := by
refine ⟨fun h ↦ ⟨n / m, one_lt_div_of_mem_properDivisors h, ?_⟩, ?_⟩
· exact (Nat.mul_div_cancel' (mem_properDivisors.mp h).1).symm
· rintro ⟨k, hk, rfl⟩
rw [mul_ne_zero_iff] at hn
exact mem_properDivisors.mpr ⟨⟨k, rfl⟩, lt_mul_of_one_lt_right (Nat.pos_of_ne_zero hn.1) hk⟩
@[simp]
lemma nonempty_properDivisors : n.properDivisors.Nonempty ↔ 1 < n :=
⟨fun ⟨_m, hm⟩ ↦ one_lt_of_mem_properDivisors hm, fun hn ↦
⟨1, one_mem_properDivisors_iff_one_lt.2 hn⟩⟩
@[simp]
lemma properDivisors_eq_empty : n.properDivisors = ∅ ↔ n ≤ 1 := by
rw [← not_nonempty_iff_eq_empty, nonempty_properDivisors, not_lt]
@[simp]
theorem divisorsAntidiagonal_zero : divisorsAntidiagonal 0 = ∅ := by
ext
simp
#align nat.divisors_antidiagonal_zero Nat.divisorsAntidiagonal_zero
@[simp]
theorem divisorsAntidiagonal_one : divisorsAntidiagonal 1 = {(1, 1)} := by
ext
simp [mul_eq_one, Prod.ext_iff]
#align nat.divisors_antidiagonal_one Nat.divisorsAntidiagonal_one
-- @[simp]
theorem swap_mem_divisorsAntidiagonal {x : ℕ × ℕ} :
x.swap ∈ divisorsAntidiagonal n ↔ x ∈ divisorsAntidiagonal n := by
rw [mem_divisorsAntidiagonal, mem_divisorsAntidiagonal, mul_comm, Prod.swap]
#align nat.swap_mem_divisors_antidiagonal Nat.swap_mem_divisorsAntidiagonal
-- Porting note: added below thm to replace the simp from the previous thm
@[simp]
theorem swap_mem_divisorsAntidiagonal_aux {x : ℕ × ℕ} :
x.snd * x.fst = n ∧ ¬n = 0 ↔ x ∈ divisorsAntidiagonal n := by
rw [mem_divisorsAntidiagonal, mul_comm]
| Mathlib/NumberTheory/Divisors.lean | 286 | 289 | theorem fst_mem_divisors_of_mem_antidiagonal {x : ℕ × ℕ} (h : x ∈ divisorsAntidiagonal n) :
x.fst ∈ divisors n := by |
rw [mem_divisorsAntidiagonal] at h
simp [Dvd.intro _ h.1, h.2]
|
import Mathlib.Algebra.Group.Basic
import Mathlib.Algebra.GroupWithZero.NeZero
import Mathlib.Logic.Unique
#align_import algebra.group_with_zero.basic from "leanprover-community/mathlib"@"e8638a0fcaf73e4500469f368ef9494e495099b3"
assert_not_exists DenselyOrdered
open scoped Classical
open Function
variable {α M₀ G₀ M₀' G₀' F F' : Type*}
section
end
section
variable [MulZeroOneClass M₀]
| Mathlib/Algebra/GroupWithZero/Basic.lean | 110 | 111 | theorem eq_zero_of_zero_eq_one (h : (0 : M₀) = 1) (a : M₀) : a = 0 := by |
rw [← mul_one a, ← h, mul_zero]
|
import Mathlib.Algebra.Category.ModuleCat.Monoidal.Basic
import Mathlib.CategoryTheory.Monoidal.Functorial
import Mathlib.CategoryTheory.Monoidal.Types.Basic
import Mathlib.LinearAlgebra.DirectSum.Finsupp
import Mathlib.CategoryTheory.Linear.LinearFunctor
#align_import algebra.category.Module.adjunctions from "leanprover-community/mathlib"@"95a87616d63b3cb49d3fe678d416fbe9c4217bf4"
set_option linter.uppercaseLean3 false -- `Module`
noncomputable section
open CategoryTheory
namespace ModuleCat
universe u
open scoped Classical
variable (R : Type u)
section
variable [Ring R]
@[simps]
def free : Type u ⥤ ModuleCat R where
obj X := ModuleCat.of R (X →₀ R)
map {X Y} f := Finsupp.lmapDomain _ _ f
map_id := by intros; exact Finsupp.lmapDomain_id _ _
map_comp := by intros; exact Finsupp.lmapDomain_comp _ _ _ _
#align Module.free ModuleCat.free
def adj : free R ⊣ forget (ModuleCat.{u} R) :=
Adjunction.mkOfHomEquiv
{ homEquiv := fun X M => (Finsupp.lift M R X).toEquiv.symm
homEquiv_naturality_left_symm := fun {_ _} M f g =>
Finsupp.lhom_ext' fun x =>
LinearMap.ext_ring
(Finsupp.sum_mapDomain_index_addMonoidHom fun y => (smulAddHom R M).flip (g y)).symm }
#align Module.adj ModuleCat.adj
instance : (forget (ModuleCat.{u} R)).IsRightAdjoint :=
(adj R).isRightAdjoint
end
namespace Free
open MonoidalCategory
variable [CommRing R]
attribute [local ext] TensorProduct.ext
def ε : 𝟙_ (ModuleCat.{u} R) ⟶ (free R).obj (𝟙_ (Type u)) :=
Finsupp.lsingle PUnit.unit
#align Module.free.ε ModuleCat.Free.ε
-- This lemma has always been bad, but lean4#2644 made `simp` start noticing
@[simp, nolint simpNF]
theorem ε_apply (r : R) : ε R r = Finsupp.single PUnit.unit r :=
rfl
#align Module.free.ε_apply ModuleCat.Free.ε_apply
def μ (α β : Type u) : (free R).obj α ⊗ (free R).obj β ≅ (free R).obj (α ⊗ β) :=
(finsuppTensorFinsupp' R α β).toModuleIso
#align Module.free.μ ModuleCat.Free.μ
theorem μ_natural {X Y X' Y' : Type u} (f : X ⟶ Y) (g : X' ⟶ Y') :
((free R).map f ⊗ (free R).map g) ≫ (μ R Y Y').hom = (μ R X X').hom ≫ (free R).map (f ⊗ g) := by
-- Porting note (#11041): broken ext
apply TensorProduct.ext
apply Finsupp.lhom_ext'
intro x
apply LinearMap.ext_ring
apply Finsupp.lhom_ext'
intro x'
apply LinearMap.ext_ring
apply Finsupp.ext
intro ⟨y, y'⟩
-- Porting note (#10934): used to be dsimp [μ]
change (finsuppTensorFinsupp' R Y Y')
(Finsupp.mapDomain f (Finsupp.single x 1) ⊗ₜ[R] Finsupp.mapDomain g (Finsupp.single x' 1)) _
= (Finsupp.mapDomain (f ⊗ g) (finsuppTensorFinsupp' R X X'
(Finsupp.single x 1 ⊗ₜ[R] Finsupp.single x' 1))) _
-- extra `rfl` after leanprover/lean4#2466
simp_rw [Finsupp.mapDomain_single, finsuppTensorFinsupp'_single_tmul_single, mul_one,
Finsupp.mapDomain_single, CategoryTheory.tensor_apply]; rfl
#align Module.free.μ_natural ModuleCat.Free.μ_natural
theorem left_unitality (X : Type u) :
(λ_ ((free R).obj X)).hom =
(ε R ⊗ 𝟙 ((free R).obj X)) ≫ (μ R (𝟙_ (Type u)) X).hom ≫ map (free R).obj (λ_ X).hom := by
-- Porting note (#11041): broken ext
apply TensorProduct.ext
apply LinearMap.ext_ring
apply Finsupp.lhom_ext'
intro x
apply LinearMap.ext_ring
apply Finsupp.ext
intro x'
-- Porting note (#10934): used to be dsimp [ε, μ]
let q : X →₀ R := ((λ_ (of R (X →₀ R))).hom) (1 ⊗ₜ[R] Finsupp.single x 1)
change q x' = Finsupp.mapDomain (λ_ X).hom (finsuppTensorFinsupp' R (𝟙_ (Type u)) X
(Finsupp.single PUnit.unit 1 ⊗ₜ[R] Finsupp.single x 1)) x'
simp_rw [q, finsuppTensorFinsupp'_single_tmul_single,
ModuleCat.MonoidalCategory.leftUnitor_hom_apply, mul_one,
Finsupp.mapDomain_single, CategoryTheory.leftUnitor_hom_apply, one_smul]
#align Module.free.left_unitality ModuleCat.Free.left_unitality
| Mathlib/Algebra/Category/ModuleCat/Adjunctions.lean | 132 | 149 | theorem right_unitality (X : Type u) :
(ρ_ ((free R).obj X)).hom =
(𝟙 ((free R).obj X) ⊗ ε R) ≫ (μ R X (𝟙_ (Type u))).hom ≫ map (free R).obj (ρ_ X).hom := by |
-- Porting note (#11041): broken ext
apply TensorProduct.ext
apply Finsupp.lhom_ext'
intro x
apply LinearMap.ext_ring
apply LinearMap.ext_ring
apply Finsupp.ext
intro x'
-- Porting note (#10934): used to be dsimp [ε, μ]
let q : X →₀ R := ((ρ_ (of R (X →₀ R))).hom) (Finsupp.single x 1 ⊗ₜ[R] 1)
change q x' = Finsupp.mapDomain (ρ_ X).hom (finsuppTensorFinsupp' R X (𝟙_ (Type u))
(Finsupp.single x 1 ⊗ₜ[R] Finsupp.single PUnit.unit 1)) x'
simp_rw [q, finsuppTensorFinsupp'_single_tmul_single,
ModuleCat.MonoidalCategory.rightUnitor_hom_apply, mul_one,
Finsupp.mapDomain_single, CategoryTheory.rightUnitor_hom_apply, one_smul]
|
import Mathlib.Algebra.Algebra.Defs
import Mathlib.Algebra.Polynomial.FieldDivision
import Mathlib.FieldTheory.Minpoly.Basic
import Mathlib.RingTheory.Adjoin.Basic
import Mathlib.RingTheory.FinitePresentation
import Mathlib.RingTheory.FiniteType
import Mathlib.RingTheory.PowerBasis
import Mathlib.RingTheory.PrincipalIdealDomain
import Mathlib.RingTheory.QuotientNoetherian
#align_import ring_theory.adjoin_root from "leanprover-community/mathlib"@"5c4b3d41a84bd2a1d79c7d9265e58a891e71be89"
noncomputable section
open scoped Classical
open Polynomial
universe u v w
variable {R : Type u} {S : Type v} {K : Type w}
open Polynomial Ideal
def AdjoinRoot [CommRing R] (f : R[X]) : Type u :=
Polynomial R ⧸ (span {f} : Ideal R[X])
#align adjoin_root AdjoinRoot
namespace AdjoinRoot
section CommRing
variable [CommRing R] (f : R[X])
instance instCommRing : CommRing (AdjoinRoot f) :=
Ideal.Quotient.commRing _
#align adjoin_root.comm_ring AdjoinRoot.instCommRing
instance : Inhabited (AdjoinRoot f) :=
⟨0⟩
instance : DecidableEq (AdjoinRoot f) :=
Classical.decEq _
protected theorem nontrivial [IsDomain R] (h : degree f ≠ 0) : Nontrivial (AdjoinRoot f) :=
Ideal.Quotient.nontrivial
(by
simp_rw [Ne, span_singleton_eq_top, Polynomial.isUnit_iff, not_exists, not_and]
rintro x hx rfl
exact h (degree_C hx.ne_zero))
#align adjoin_root.nontrivial AdjoinRoot.nontrivial
def mk : R[X] →+* AdjoinRoot f :=
Ideal.Quotient.mk _
#align adjoin_root.mk AdjoinRoot.mk
@[elab_as_elim]
theorem induction_on {C : AdjoinRoot f → Prop} (x : AdjoinRoot f) (ih : ∀ p : R[X], C (mk f p)) :
C x :=
Quotient.inductionOn' x ih
#align adjoin_root.induction_on AdjoinRoot.induction_on
def of : R →+* AdjoinRoot f :=
(mk f).comp C
#align adjoin_root.of AdjoinRoot.of
instance instSMulAdjoinRoot [DistribSMul S R] [IsScalarTower S R R] : SMul S (AdjoinRoot f) :=
Submodule.Quotient.instSMul' _
instance [DistribSMul S R] [IsScalarTower S R R] : DistribSMul S (AdjoinRoot f) :=
Submodule.Quotient.distribSMul' _
@[simp]
theorem smul_mk [DistribSMul S R] [IsScalarTower S R R] (a : S) (x : R[X]) :
a • mk f x = mk f (a • x) :=
rfl
#align adjoin_root.smul_mk AdjoinRoot.smul_mk
theorem smul_of [DistribSMul S R] [IsScalarTower S R R] (a : S) (x : R) :
a • of f x = of f (a • x) := by rw [of, RingHom.comp_apply, RingHom.comp_apply, smul_mk, smul_C]
#align adjoin_root.smul_of AdjoinRoot.smul_of
instance (R₁ R₂ : Type*) [SMul R₁ R₂] [DistribSMul R₁ R] [DistribSMul R₂ R] [IsScalarTower R₁ R R]
[IsScalarTower R₂ R R] [IsScalarTower R₁ R₂ R] (f : R[X]) :
IsScalarTower R₁ R₂ (AdjoinRoot f) :=
Submodule.Quotient.isScalarTower _ _
instance (R₁ R₂ : Type*) [DistribSMul R₁ R] [DistribSMul R₂ R] [IsScalarTower R₁ R R]
[IsScalarTower R₂ R R] [SMulCommClass R₁ R₂ R] (f : R[X]) :
SMulCommClass R₁ R₂ (AdjoinRoot f) :=
Submodule.Quotient.smulCommClass _ _
instance isScalarTower_right [DistribSMul S R] [IsScalarTower S R R] :
IsScalarTower S (AdjoinRoot f) (AdjoinRoot f) :=
Ideal.Quotient.isScalarTower_right
#align adjoin_root.is_scalar_tower_right AdjoinRoot.isScalarTower_right
instance [Monoid S] [DistribMulAction S R] [IsScalarTower S R R] (f : R[X]) :
DistribMulAction S (AdjoinRoot f) :=
Submodule.Quotient.distribMulAction' _
instance [CommSemiring S] [Algebra S R] : Algebra S (AdjoinRoot f) :=
Ideal.Quotient.algebra S
@[simp]
theorem algebraMap_eq : algebraMap R (AdjoinRoot f) = of f :=
rfl
#align adjoin_root.algebra_map_eq AdjoinRoot.algebraMap_eq
variable (S)
theorem algebraMap_eq' [CommSemiring S] [Algebra S R] :
algebraMap S (AdjoinRoot f) = (of f).comp (algebraMap S R) :=
rfl
#align adjoin_root.algebra_map_eq' AdjoinRoot.algebraMap_eq'
variable {S}
theorem finiteType : Algebra.FiniteType R (AdjoinRoot f) :=
(Algebra.FiniteType.polynomial R).of_surjective _ (Ideal.Quotient.mkₐ_surjective R _)
#align adjoin_root.finite_type AdjoinRoot.finiteType
theorem finitePresentation : Algebra.FinitePresentation R (AdjoinRoot f) :=
(Algebra.FinitePresentation.polynomial R).quotient (Submodule.fg_span_singleton f)
#align adjoin_root.finite_presentation AdjoinRoot.finitePresentation
def root : AdjoinRoot f :=
mk f X
#align adjoin_root.root AdjoinRoot.root
variable {f}
instance hasCoeT : CoeTC R (AdjoinRoot f) :=
⟨of f⟩
#align adjoin_root.has_coe_t AdjoinRoot.hasCoeT
@[ext]
theorem algHom_ext [Semiring S] [Algebra R S] {g₁ g₂ : AdjoinRoot f →ₐ[R] S}
(h : g₁ (root f) = g₂ (root f)) : g₁ = g₂ :=
Ideal.Quotient.algHom_ext R <| Polynomial.algHom_ext h
#align adjoin_root.alg_hom_ext AdjoinRoot.algHom_ext
@[simp]
theorem mk_eq_mk {g h : R[X]} : mk f g = mk f h ↔ f ∣ g - h :=
Ideal.Quotient.eq.trans Ideal.mem_span_singleton
#align adjoin_root.mk_eq_mk AdjoinRoot.mk_eq_mk
@[simp]
theorem mk_eq_zero {g : R[X]} : mk f g = 0 ↔ f ∣ g :=
mk_eq_mk.trans <| by rw [sub_zero]
#align adjoin_root.mk_eq_zero AdjoinRoot.mk_eq_zero
@[simp]
theorem mk_self : mk f f = 0 :=
Quotient.sound' <| QuotientAddGroup.leftRel_apply.mpr (mem_span_singleton.2 <| by simp)
#align adjoin_root.mk_self AdjoinRoot.mk_self
@[simp]
theorem mk_C (x : R) : mk f (C x) = x :=
rfl
set_option linter.uppercaseLean3 false in
#align adjoin_root.mk_C AdjoinRoot.mk_C
@[simp]
theorem mk_X : mk f X = root f :=
rfl
set_option linter.uppercaseLean3 false in
#align adjoin_root.mk_X AdjoinRoot.mk_X
theorem mk_ne_zero_of_degree_lt (hf : Monic f) {g : R[X]} (h0 : g ≠ 0) (hd : degree g < degree f) :
mk f g ≠ 0 :=
mk_eq_zero.not.2 <| hf.not_dvd_of_degree_lt h0 hd
#align adjoin_root.mk_ne_zero_of_degree_lt AdjoinRoot.mk_ne_zero_of_degree_lt
theorem mk_ne_zero_of_natDegree_lt (hf : Monic f) {g : R[X]} (h0 : g ≠ 0)
(hd : natDegree g < natDegree f) : mk f g ≠ 0 :=
mk_eq_zero.not.2 <| hf.not_dvd_of_natDegree_lt h0 hd
#align adjoin_root.mk_ne_zero_of_nat_degree_lt AdjoinRoot.mk_ne_zero_of_natDegree_lt
@[simp]
theorem aeval_eq (p : R[X]) : aeval (root f) p = mk f p :=
Polynomial.induction_on p
(fun x => by
rw [aeval_C]
rfl)
(fun p q ihp ihq => by rw [AlgHom.map_add, RingHom.map_add, ihp, ihq]) fun n x _ => by
rw [AlgHom.map_mul, aeval_C, AlgHom.map_pow, aeval_X, RingHom.map_mul, mk_C, RingHom.map_pow,
mk_X]
rfl
#align adjoin_root.aeval_eq AdjoinRoot.aeval_eq
-- Porting note: the following proof was partly in term-mode, but I was not able to fix it.
| Mathlib/RingTheory/AdjoinRoot.lean | 237 | 240 | theorem adjoinRoot_eq_top : Algebra.adjoin R ({root f} : Set (AdjoinRoot f)) = ⊤ := by |
refine Algebra.eq_top_iff.2 fun x => ?_
induction x using AdjoinRoot.induction_on with
| ih p => exact (Algebra.adjoin_singleton_eq_range_aeval R (root f)).symm ▸ ⟨p, aeval_eq p⟩
|
import Mathlib.Analysis.Convex.Hull
import Mathlib.LinearAlgebra.AffineSpace.Independent
#align_import analysis.convex.simplicial_complex.basic from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a"
open Finset Set
variable (𝕜 E : Type*) {ι : Type*} [OrderedRing 𝕜] [AddCommGroup E] [Module 𝕜 E]
namespace Geometry
-- TODO: update to new binder order? not sure what binder order is correct for `down_closed`.
@[ext]
structure SimplicialComplex where
faces : Set (Finset E)
not_empty_mem : ∅ ∉ faces
indep : ∀ {s}, s ∈ faces → AffineIndependent 𝕜 ((↑) : s → E)
down_closed : ∀ {s t}, s ∈ faces → t ⊆ s → t ≠ ∅ → t ∈ faces
inter_subset_convexHull : ∀ {s t}, s ∈ faces → t ∈ faces →
convexHull 𝕜 ↑s ∩ convexHull 𝕜 ↑t ⊆ convexHull 𝕜 (s ∩ t : Set E)
#align geometry.simplicial_complex Geometry.SimplicialComplex
namespace SimplicialComplex
variable {𝕜 E}
variable {K : SimplicialComplex 𝕜 E} {s t : Finset E} {x : E}
instance : Membership (Finset E) (SimplicialComplex 𝕜 E) :=
⟨fun s K => s ∈ K.faces⟩
def space (K : SimplicialComplex 𝕜 E) : Set E :=
⋃ s ∈ K.faces, convexHull 𝕜 (s : Set E)
#align geometry.simplicial_complex.space Geometry.SimplicialComplex.space
-- Porting note: Expanded `∃ s ∈ K.faces` to get the type to match more closely with Lean 3
theorem mem_space_iff : x ∈ K.space ↔ ∃ s ∈ K.faces, x ∈ convexHull 𝕜 (s : Set E) := by
simp [space]
#align geometry.simplicial_complex.mem_space_iff Geometry.SimplicialComplex.mem_space_iff
-- Porting note: Original proof was `:= subset_biUnion_of_mem hs`
theorem convexHull_subset_space (hs : s ∈ K.faces) : convexHull 𝕜 ↑s ⊆ K.space := by
convert subset_biUnion_of_mem hs
rfl
#align geometry.simplicial_complex.convex_hull_subset_space Geometry.SimplicialComplex.convexHull_subset_space
protected theorem subset_space (hs : s ∈ K.faces) : (s : Set E) ⊆ K.space :=
(subset_convexHull 𝕜 _).trans <| convexHull_subset_space hs
#align geometry.simplicial_complex.subset_space Geometry.SimplicialComplex.subset_space
theorem convexHull_inter_convexHull (hs : s ∈ K.faces) (ht : t ∈ K.faces) :
convexHull 𝕜 ↑s ∩ convexHull 𝕜 ↑t = convexHull 𝕜 (s ∩ t : Set E) :=
(K.inter_subset_convexHull hs ht).antisymm <|
subset_inter (convexHull_mono Set.inter_subset_left) <|
convexHull_mono Set.inter_subset_right
#align geometry.simplicial_complex.convex_hull_inter_convex_hull Geometry.SimplicialComplex.convexHull_inter_convexHull
theorem disjoint_or_exists_inter_eq_convexHull (hs : s ∈ K.faces) (ht : t ∈ K.faces) :
Disjoint (convexHull 𝕜 (s : Set E)) (convexHull 𝕜 ↑t) ∨
∃ u ∈ K.faces, convexHull 𝕜 (s : Set E) ∩ convexHull 𝕜 ↑t = convexHull 𝕜 ↑u := by
classical
by_contra! h
refine h.2 (s ∩ t) (K.down_closed hs inter_subset_left fun hst => h.1 <|
disjoint_iff_inf_le.mpr <| (K.inter_subset_convexHull hs ht).trans ?_) ?_
· rw [← coe_inter, hst, coe_empty, convexHull_empty]
rfl
· rw [coe_inter, convexHull_inter_convexHull hs ht]
#align geometry.simplicial_complex.disjoint_or_exists_inter_eq_convex_hull Geometry.SimplicialComplex.disjoint_or_exists_inter_eq_convexHull
@[simps]
def ofErase (faces : Set (Finset E)) (indep : ∀ s ∈ faces, AffineIndependent 𝕜 ((↑) : s → E))
(down_closed : ∀ s ∈ faces, ∀ t ⊆ s, t ∈ faces)
(inter_subset_convexHull : ∀ᵉ (s ∈ faces) (t ∈ faces),
convexHull 𝕜 ↑s ∩ convexHull 𝕜 ↑t ⊆ convexHull 𝕜 (s ∩ t : Set E)) :
SimplicialComplex 𝕜 E where
faces := faces \ {∅}
not_empty_mem h := h.2 (mem_singleton _)
indep hs := indep _ hs.1
down_closed hs hts ht := ⟨down_closed _ hs.1 _ hts, ht⟩
inter_subset_convexHull hs ht := inter_subset_convexHull _ hs.1 _ ht.1
#align geometry.simplicial_complex.of_erase Geometry.SimplicialComplex.ofErase
@[simps]
def ofSubcomplex (K : SimplicialComplex 𝕜 E) (faces : Set (Finset E)) (subset : faces ⊆ K.faces)
(down_closed : ∀ {s t}, s ∈ faces → t ⊆ s → t ∈ faces) : SimplicialComplex 𝕜 E :=
{ faces
not_empty_mem := fun h => K.not_empty_mem (subset h)
indep := fun hs => K.indep (subset hs)
down_closed := fun hs hts _ => down_closed hs hts
inter_subset_convexHull := fun hs ht => K.inter_subset_convexHull (subset hs) (subset ht) }
#align geometry.simplicial_complex.of_subcomplex Geometry.SimplicialComplex.ofSubcomplex
def vertices (K : SimplicialComplex 𝕜 E) : Set E :=
{ x | {x} ∈ K.faces }
#align geometry.simplicial_complex.vertices Geometry.SimplicialComplex.vertices
theorem mem_vertices : x ∈ K.vertices ↔ {x} ∈ K.faces := Iff.rfl
#align geometry.simplicial_complex.mem_vertices Geometry.SimplicialComplex.mem_vertices
theorem vertices_eq : K.vertices = ⋃ k ∈ K.faces, (k : Set E) := by
ext x
refine ⟨fun h => mem_biUnion h <| mem_coe.2 <| mem_singleton_self x, fun h => ?_⟩
obtain ⟨s, hs, hx⟩ := mem_iUnion₂.1 h
exact K.down_closed hs (Finset.singleton_subset_iff.2 <| mem_coe.1 hx) (singleton_ne_empty _)
#align geometry.simplicial_complex.vertices_eq Geometry.SimplicialComplex.vertices_eq
theorem vertices_subset_space : K.vertices ⊆ K.space :=
vertices_eq.subset.trans <| iUnion₂_mono fun x _ => subset_convexHull 𝕜 (x : Set E)
#align geometry.simplicial_complex.vertices_subset_space Geometry.SimplicialComplex.vertices_subset_space
theorem vertex_mem_convexHull_iff (hx : x ∈ K.vertices) (hs : s ∈ K.faces) :
x ∈ convexHull 𝕜 (s : Set E) ↔ x ∈ s := by
refine ⟨fun h => ?_, fun h => subset_convexHull 𝕜 _ h⟩
classical
have h := K.inter_subset_convexHull hx hs ⟨by simp, h⟩
by_contra H
rwa [← coe_inter, Finset.disjoint_iff_inter_eq_empty.1 (Finset.disjoint_singleton_right.2 H).symm,
coe_empty, convexHull_empty] at h
#align geometry.simplicial_complex.vertex_mem_convex_hull_iff Geometry.SimplicialComplex.vertex_mem_convexHull_iff
theorem face_subset_face_iff (hs : s ∈ K.faces) (ht : t ∈ K.faces) :
convexHull 𝕜 (s : Set E) ⊆ convexHull 𝕜 ↑t ↔ s ⊆ t :=
⟨fun h _ hxs =>
(vertex_mem_convexHull_iff
(K.down_closed hs (Finset.singleton_subset_iff.2 hxs) <| singleton_ne_empty _) ht).1
(h (subset_convexHull 𝕜 (↑s) hxs)),
convexHull_mono⟩
#align geometry.simplicial_complex.face_subset_face_iff Geometry.SimplicialComplex.face_subset_face_iff
def facets (K : SimplicialComplex 𝕜 E) : Set (Finset E) :=
{ s ∈ K.faces | ∀ ⦃t⦄, t ∈ K.faces → s ⊆ t → s = t }
#align geometry.simplicial_complex.facets Geometry.SimplicialComplex.facets
theorem mem_facets : s ∈ K.facets ↔ s ∈ K.faces ∧ ∀ t ∈ K.faces, s ⊆ t → s = t :=
mem_sep_iff
#align geometry.simplicial_complex.mem_facets Geometry.SimplicialComplex.mem_facets
theorem facets_subset : K.facets ⊆ K.faces := fun _ hs => hs.1
#align geometry.simplicial_complex.facets_subset Geometry.SimplicialComplex.facets_subset
| Mathlib/Analysis/Convex/SimplicialComplex/Basic.lean | 204 | 212 | theorem not_facet_iff_subface (hs : s ∈ K.faces) : s ∉ K.facets ↔ ∃ t, t ∈ K.faces ∧ s ⊂ t := by |
refine ⟨fun hs' : ¬(_ ∧ _) => ?_, ?_⟩
· push_neg at hs'
obtain ⟨t, ht⟩ := hs' hs
exact ⟨t, ht.1, ⟨ht.2.1, fun hts => ht.2.2 (Subset.antisymm ht.2.1 hts)⟩⟩
· rintro ⟨t, ht⟩ ⟨hs, hs'⟩
have := hs' ht.1 ht.2.1
rw [this] at ht
exact ht.2.2 (Subset.refl t)
|
import Mathlib.Init.ZeroOne
import Mathlib.Data.Set.Defs
import Mathlib.Order.Basic
import Mathlib.Order.SymmDiff
import Mathlib.Tactic.Tauto
import Mathlib.Tactic.ByContra
import Mathlib.Util.Delaborators
#align_import data.set.basic from "leanprover-community/mathlib"@"001ffdc42920050657fd45bd2b8bfbec8eaaeb29"
open Function
universe u v w x
namespace Set
variable {α : Type u} {s t : Set α}
instance instBooleanAlgebraSet : BooleanAlgebra (Set α) :=
{ (inferInstance : BooleanAlgebra (α → Prop)) with
sup := (· ∪ ·),
le := (· ≤ ·),
lt := fun s t => s ⊆ t ∧ ¬t ⊆ s,
inf := (· ∩ ·),
bot := ∅,
compl := (·ᶜ),
top := univ,
sdiff := (· \ ·) }
instance : HasSSubset (Set α) :=
⟨(· < ·)⟩
@[simp]
theorem top_eq_univ : (⊤ : Set α) = univ :=
rfl
#align set.top_eq_univ Set.top_eq_univ
@[simp]
theorem bot_eq_empty : (⊥ : Set α) = ∅ :=
rfl
#align set.bot_eq_empty Set.bot_eq_empty
@[simp]
theorem sup_eq_union : ((· ⊔ ·) : Set α → Set α → Set α) = (· ∪ ·) :=
rfl
#align set.sup_eq_union Set.sup_eq_union
@[simp]
theorem inf_eq_inter : ((· ⊓ ·) : Set α → Set α → Set α) = (· ∩ ·) :=
rfl
#align set.inf_eq_inter Set.inf_eq_inter
@[simp]
theorem le_eq_subset : ((· ≤ ·) : Set α → Set α → Prop) = (· ⊆ ·) :=
rfl
#align set.le_eq_subset Set.le_eq_subset
@[simp]
theorem lt_eq_ssubset : ((· < ·) : Set α → Set α → Prop) = (· ⊂ ·) :=
rfl
#align set.lt_eq_ssubset Set.lt_eq_ssubset
theorem le_iff_subset : s ≤ t ↔ s ⊆ t :=
Iff.rfl
#align set.le_iff_subset Set.le_iff_subset
theorem lt_iff_ssubset : s < t ↔ s ⊂ t :=
Iff.rfl
#align set.lt_iff_ssubset Set.lt_iff_ssubset
alias ⟨_root_.LE.le.subset, _root_.HasSubset.Subset.le⟩ := le_iff_subset
#align has_subset.subset.le HasSubset.Subset.le
alias ⟨_root_.LT.lt.ssubset, _root_.HasSSubset.SSubset.lt⟩ := lt_iff_ssubset
#align has_ssubset.ssubset.lt HasSSubset.SSubset.lt
instance PiSetCoe.canLift (ι : Type u) (α : ι → Type v) [∀ i, Nonempty (α i)] (s : Set ι) :
CanLift (∀ i : s, α i) (∀ i, α i) (fun f i => f i) fun _ => True :=
PiSubtype.canLift ι α s
#align set.pi_set_coe.can_lift Set.PiSetCoe.canLift
instance PiSetCoe.canLift' (ι : Type u) (α : Type v) [Nonempty α] (s : Set ι) :
CanLift (s → α) (ι → α) (fun f i => f i) fun _ => True :=
PiSetCoe.canLift ι (fun _ => α) s
#align set.pi_set_coe.can_lift' Set.PiSetCoe.canLift'
end Set
theorem Subtype.mem {α : Type*} {s : Set α} (p : s) : (p : α) ∈ s :=
p.prop
#align subtype.mem Subtype.mem
theorem Eq.subset {α} {s t : Set α} : s = t → s ⊆ t :=
fun h₁ _ h₂ => by rw [← h₁]; exact h₂
#align eq.subset Eq.subset
namespace Set
variable {α : Type u} {β : Type v} {γ : Type w} {ι : Sort x} {a b : α} {s s₁ s₂ t t₁ t₂ u : Set α}
instance : Inhabited (Set α) :=
⟨∅⟩
theorem ext_iff {s t : Set α} : s = t ↔ ∀ x, x ∈ s ↔ x ∈ t :=
⟨fun h x => by rw [h], ext⟩
#align set.ext_iff Set.ext_iff
@[trans]
theorem mem_of_mem_of_subset {x : α} {s t : Set α} (hx : x ∈ s) (h : s ⊆ t) : x ∈ t :=
h hx
#align set.mem_of_mem_of_subset Set.mem_of_mem_of_subset
theorem forall_in_swap {p : α → β → Prop} : (∀ a ∈ s, ∀ (b), p a b) ↔ ∀ (b), ∀ a ∈ s, p a b := by
tauto
#align set.forall_in_swap Set.forall_in_swap
theorem mem_setOf {a : α} {p : α → Prop} : a ∈ { x | p x } ↔ p a :=
Iff.rfl
#align set.mem_set_of Set.mem_setOf
theorem _root_.Membership.mem.out {p : α → Prop} {a : α} (h : a ∈ { x | p x }) : p a :=
h
#align has_mem.mem.out Membership.mem.out
theorem nmem_setOf_iff {a : α} {p : α → Prop} : a ∉ { x | p x } ↔ ¬p a :=
Iff.rfl
#align set.nmem_set_of_iff Set.nmem_setOf_iff
@[simp]
theorem setOf_mem_eq {s : Set α} : { x | x ∈ s } = s :=
rfl
#align set.set_of_mem_eq Set.setOf_mem_eq
theorem setOf_set {s : Set α} : setOf s = s :=
rfl
#align set.set_of_set Set.setOf_set
theorem setOf_app_iff {p : α → Prop} {x : α} : { x | p x } x ↔ p x :=
Iff.rfl
#align set.set_of_app_iff Set.setOf_app_iff
theorem mem_def {a : α} {s : Set α} : a ∈ s ↔ s a :=
Iff.rfl
#align set.mem_def Set.mem_def
theorem setOf_bijective : Bijective (setOf : (α → Prop) → Set α) :=
bijective_id
#align set.set_of_bijective Set.setOf_bijective
theorem subset_setOf {p : α → Prop} {s : Set α} : s ⊆ setOf p ↔ ∀ x, x ∈ s → p x :=
Iff.rfl
theorem setOf_subset {p : α → Prop} {s : Set α} : setOf p ⊆ s ↔ ∀ x, p x → x ∈ s :=
Iff.rfl
@[simp]
theorem setOf_subset_setOf {p q : α → Prop} : { a | p a } ⊆ { a | q a } ↔ ∀ a, p a → q a :=
Iff.rfl
#align set.set_of_subset_set_of Set.setOf_subset_setOf
theorem setOf_and {p q : α → Prop} : { a | p a ∧ q a } = { a | p a } ∩ { a | q a } :=
rfl
#align set.set_of_and Set.setOf_and
theorem setOf_or {p q : α → Prop} : { a | p a ∨ q a } = { a | p a } ∪ { a | q a } :=
rfl
#align set.set_of_or Set.setOf_or
instance : IsRefl (Set α) (· ⊆ ·) :=
show IsRefl (Set α) (· ≤ ·) by infer_instance
instance : IsTrans (Set α) (· ⊆ ·) :=
show IsTrans (Set α) (· ≤ ·) by infer_instance
instance : Trans ((· ⊆ ·) : Set α → Set α → Prop) (· ⊆ ·) (· ⊆ ·) :=
show Trans (· ≤ ·) (· ≤ ·) (· ≤ ·) by infer_instance
instance : IsAntisymm (Set α) (· ⊆ ·) :=
show IsAntisymm (Set α) (· ≤ ·) by infer_instance
instance : IsIrrefl (Set α) (· ⊂ ·) :=
show IsIrrefl (Set α) (· < ·) by infer_instance
instance : IsTrans (Set α) (· ⊂ ·) :=
show IsTrans (Set α) (· < ·) by infer_instance
instance : Trans ((· ⊂ ·) : Set α → Set α → Prop) (· ⊂ ·) (· ⊂ ·) :=
show Trans (· < ·) (· < ·) (· < ·) by infer_instance
instance : Trans ((· ⊂ ·) : Set α → Set α → Prop) (· ⊆ ·) (· ⊂ ·) :=
show Trans (· < ·) (· ≤ ·) (· < ·) by infer_instance
instance : Trans ((· ⊆ ·) : Set α → Set α → Prop) (· ⊂ ·) (· ⊂ ·) :=
show Trans (· ≤ ·) (· < ·) (· < ·) by infer_instance
instance : IsAsymm (Set α) (· ⊂ ·) :=
show IsAsymm (Set α) (· < ·) by infer_instance
instance : IsNonstrictStrictOrder (Set α) (· ⊆ ·) (· ⊂ ·) :=
⟨fun _ _ => Iff.rfl⟩
-- TODO(Jeremy): write a tactic to unfold specific instances of generic notation?
theorem subset_def : (s ⊆ t) = ∀ x, x ∈ s → x ∈ t :=
rfl
#align set.subset_def Set.subset_def
theorem ssubset_def : (s ⊂ t) = (s ⊆ t ∧ ¬t ⊆ s) :=
rfl
#align set.ssubset_def Set.ssubset_def
@[refl]
theorem Subset.refl (a : Set α) : a ⊆ a := fun _ => id
#align set.subset.refl Set.Subset.refl
theorem Subset.rfl {s : Set α} : s ⊆ s :=
Subset.refl s
#align set.subset.rfl Set.Subset.rfl
@[trans]
theorem Subset.trans {a b c : Set α} (ab : a ⊆ b) (bc : b ⊆ c) : a ⊆ c := fun _ h => bc <| ab h
#align set.subset.trans Set.Subset.trans
@[trans]
theorem mem_of_eq_of_mem {x y : α} {s : Set α} (hx : x = y) (h : y ∈ s) : x ∈ s :=
hx.symm ▸ h
#align set.mem_of_eq_of_mem Set.mem_of_eq_of_mem
theorem Subset.antisymm {a b : Set α} (h₁ : a ⊆ b) (h₂ : b ⊆ a) : a = b :=
Set.ext fun _ => ⟨@h₁ _, @h₂ _⟩
#align set.subset.antisymm Set.Subset.antisymm
theorem Subset.antisymm_iff {a b : Set α} : a = b ↔ a ⊆ b ∧ b ⊆ a :=
⟨fun e => ⟨e.subset, e.symm.subset⟩, fun ⟨h₁, h₂⟩ => Subset.antisymm h₁ h₂⟩
#align set.subset.antisymm_iff Set.Subset.antisymm_iff
-- an alternative name
theorem eq_of_subset_of_subset {a b : Set α} : a ⊆ b → b ⊆ a → a = b :=
Subset.antisymm
#align set.eq_of_subset_of_subset Set.eq_of_subset_of_subset
theorem mem_of_subset_of_mem {s₁ s₂ : Set α} {a : α} (h : s₁ ⊆ s₂) : a ∈ s₁ → a ∈ s₂ :=
@h _
#align set.mem_of_subset_of_mem Set.mem_of_subset_of_mem
theorem not_mem_subset (h : s ⊆ t) : a ∉ t → a ∉ s :=
mt <| mem_of_subset_of_mem h
#align set.not_mem_subset Set.not_mem_subset
theorem not_subset : ¬s ⊆ t ↔ ∃ a ∈ s, a ∉ t := by
simp only [subset_def, not_forall, exists_prop]
#align set.not_subset Set.not_subset
lemma eq_of_forall_subset_iff (h : ∀ u, s ⊆ u ↔ t ⊆ u) : s = t := eq_of_forall_ge_iff h
protected theorem eq_or_ssubset_of_subset (h : s ⊆ t) : s = t ∨ s ⊂ t :=
eq_or_lt_of_le h
#align set.eq_or_ssubset_of_subset Set.eq_or_ssubset_of_subset
theorem exists_of_ssubset {s t : Set α} (h : s ⊂ t) : ∃ x ∈ t, x ∉ s :=
not_subset.1 h.2
#align set.exists_of_ssubset Set.exists_of_ssubset
protected theorem ssubset_iff_subset_ne {s t : Set α} : s ⊂ t ↔ s ⊆ t ∧ s ≠ t :=
@lt_iff_le_and_ne (Set α) _ s t
#align set.ssubset_iff_subset_ne Set.ssubset_iff_subset_ne
theorem ssubset_iff_of_subset {s t : Set α} (h : s ⊆ t) : s ⊂ t ↔ ∃ x ∈ t, x ∉ s :=
⟨exists_of_ssubset, fun ⟨_, hxt, hxs⟩ => ⟨h, fun h => hxs <| h hxt⟩⟩
#align set.ssubset_iff_of_subset Set.ssubset_iff_of_subset
protected theorem ssubset_of_ssubset_of_subset {s₁ s₂ s₃ : Set α} (hs₁s₂ : s₁ ⊂ s₂)
(hs₂s₃ : s₂ ⊆ s₃) : s₁ ⊂ s₃ :=
⟨Subset.trans hs₁s₂.1 hs₂s₃, fun hs₃s₁ => hs₁s₂.2 (Subset.trans hs₂s₃ hs₃s₁)⟩
#align set.ssubset_of_ssubset_of_subset Set.ssubset_of_ssubset_of_subset
protected theorem ssubset_of_subset_of_ssubset {s₁ s₂ s₃ : Set α} (hs₁s₂ : s₁ ⊆ s₂)
(hs₂s₃ : s₂ ⊂ s₃) : s₁ ⊂ s₃ :=
⟨Subset.trans hs₁s₂ hs₂s₃.1, fun hs₃s₁ => hs₂s₃.2 (Subset.trans hs₃s₁ hs₁s₂)⟩
#align set.ssubset_of_subset_of_ssubset Set.ssubset_of_subset_of_ssubset
theorem not_mem_empty (x : α) : ¬x ∈ (∅ : Set α) :=
id
#align set.not_mem_empty Set.not_mem_empty
-- Porting note (#10618): removed `simp` because `simp` can prove it
theorem not_not_mem : ¬a ∉ s ↔ a ∈ s :=
not_not
#align set.not_not_mem Set.not_not_mem
-- Porting note: we seem to need parentheses at `(↥s)`,
-- even if we increase the right precedence of `↥` in `Mathlib.Tactic.Coe`.
-- Porting note: removed `simp` as it is competing with `nonempty_subtype`.
-- @[simp]
theorem nonempty_coe_sort {s : Set α} : Nonempty (↥s) ↔ s.Nonempty :=
nonempty_subtype
#align set.nonempty_coe_sort Set.nonempty_coe_sort
alias ⟨_, Nonempty.coe_sort⟩ := nonempty_coe_sort
#align set.nonempty.coe_sort Set.Nonempty.coe_sort
theorem nonempty_def : s.Nonempty ↔ ∃ x, x ∈ s :=
Iff.rfl
#align set.nonempty_def Set.nonempty_def
theorem nonempty_of_mem {x} (h : x ∈ s) : s.Nonempty :=
⟨x, h⟩
#align set.nonempty_of_mem Set.nonempty_of_mem
theorem Nonempty.not_subset_empty : s.Nonempty → ¬s ⊆ ∅
| ⟨_, hx⟩, hs => hs hx
#align set.nonempty.not_subset_empty Set.Nonempty.not_subset_empty
protected noncomputable def Nonempty.some (h : s.Nonempty) : α :=
Classical.choose h
#align set.nonempty.some Set.Nonempty.some
protected theorem Nonempty.some_mem (h : s.Nonempty) : h.some ∈ s :=
Classical.choose_spec h
#align set.nonempty.some_mem Set.Nonempty.some_mem
theorem Nonempty.mono (ht : s ⊆ t) (hs : s.Nonempty) : t.Nonempty :=
hs.imp ht
#align set.nonempty.mono Set.Nonempty.mono
theorem nonempty_of_not_subset (h : ¬s ⊆ t) : (s \ t).Nonempty :=
let ⟨x, xs, xt⟩ := not_subset.1 h
⟨x, xs, xt⟩
#align set.nonempty_of_not_subset Set.nonempty_of_not_subset
theorem nonempty_of_ssubset (ht : s ⊂ t) : (t \ s).Nonempty :=
nonempty_of_not_subset ht.2
#align set.nonempty_of_ssubset Set.nonempty_of_ssubset
theorem Nonempty.of_diff (h : (s \ t).Nonempty) : s.Nonempty :=
h.imp fun _ => And.left
#align set.nonempty.of_diff Set.Nonempty.of_diff
theorem nonempty_of_ssubset' (ht : s ⊂ t) : t.Nonempty :=
(nonempty_of_ssubset ht).of_diff
#align set.nonempty_of_ssubset' Set.nonempty_of_ssubset'
theorem Nonempty.inl (hs : s.Nonempty) : (s ∪ t).Nonempty :=
hs.imp fun _ => Or.inl
#align set.nonempty.inl Set.Nonempty.inl
theorem Nonempty.inr (ht : t.Nonempty) : (s ∪ t).Nonempty :=
ht.imp fun _ => Or.inr
#align set.nonempty.inr Set.Nonempty.inr
@[simp]
theorem union_nonempty : (s ∪ t).Nonempty ↔ s.Nonempty ∨ t.Nonempty :=
exists_or
#align set.union_nonempty Set.union_nonempty
theorem Nonempty.left (h : (s ∩ t).Nonempty) : s.Nonempty :=
h.imp fun _ => And.left
#align set.nonempty.left Set.Nonempty.left
theorem Nonempty.right (h : (s ∩ t).Nonempty) : t.Nonempty :=
h.imp fun _ => And.right
#align set.nonempty.right Set.Nonempty.right
theorem inter_nonempty : (s ∩ t).Nonempty ↔ ∃ x, x ∈ s ∧ x ∈ t :=
Iff.rfl
#align set.inter_nonempty Set.inter_nonempty
theorem inter_nonempty_iff_exists_left : (s ∩ t).Nonempty ↔ ∃ x ∈ s, x ∈ t := by
simp_rw [inter_nonempty]
#align set.inter_nonempty_iff_exists_left Set.inter_nonempty_iff_exists_left
theorem inter_nonempty_iff_exists_right : (s ∩ t).Nonempty ↔ ∃ x ∈ t, x ∈ s := by
simp_rw [inter_nonempty, and_comm]
#align set.inter_nonempty_iff_exists_right Set.inter_nonempty_iff_exists_right
theorem nonempty_iff_univ_nonempty : Nonempty α ↔ (univ : Set α).Nonempty :=
⟨fun ⟨x⟩ => ⟨x, trivial⟩, fun ⟨x, _⟩ => ⟨x⟩⟩
#align set.nonempty_iff_univ_nonempty Set.nonempty_iff_univ_nonempty
@[simp]
theorem univ_nonempty : ∀ [Nonempty α], (univ : Set α).Nonempty
| ⟨x⟩ => ⟨x, trivial⟩
#align set.univ_nonempty Set.univ_nonempty
theorem Nonempty.to_subtype : s.Nonempty → Nonempty (↥s) :=
nonempty_subtype.2
#align set.nonempty.to_subtype Set.Nonempty.to_subtype
theorem Nonempty.to_type : s.Nonempty → Nonempty α := fun ⟨x, _⟩ => ⟨x⟩
#align set.nonempty.to_type Set.Nonempty.to_type
instance univ.nonempty [Nonempty α] : Nonempty (↥(Set.univ : Set α)) :=
Set.univ_nonempty.to_subtype
#align set.univ.nonempty Set.univ.nonempty
theorem nonempty_of_nonempty_subtype [Nonempty (↥s)] : s.Nonempty :=
nonempty_subtype.mp ‹_›
#align set.nonempty_of_nonempty_subtype Set.nonempty_of_nonempty_subtype
theorem empty_def : (∅ : Set α) = { _x : α | False } :=
rfl
#align set.empty_def Set.empty_def
@[simp]
theorem mem_empty_iff_false (x : α) : x ∈ (∅ : Set α) ↔ False :=
Iff.rfl
#align set.mem_empty_iff_false Set.mem_empty_iff_false
@[simp]
theorem setOf_false : { _a : α | False } = ∅ :=
rfl
#align set.set_of_false Set.setOf_false
@[simp] theorem setOf_bot : { _x : α | ⊥ } = ∅ := rfl
@[simp]
theorem empty_subset (s : Set α) : ∅ ⊆ s :=
nofun
#align set.empty_subset Set.empty_subset
theorem subset_empty_iff {s : Set α} : s ⊆ ∅ ↔ s = ∅ :=
(Subset.antisymm_iff.trans <| and_iff_left (empty_subset _)).symm
#align set.subset_empty_iff Set.subset_empty_iff
theorem eq_empty_iff_forall_not_mem {s : Set α} : s = ∅ ↔ ∀ x, x ∉ s :=
subset_empty_iff.symm
#align set.eq_empty_iff_forall_not_mem Set.eq_empty_iff_forall_not_mem
theorem eq_empty_of_forall_not_mem (h : ∀ x, x ∉ s) : s = ∅ :=
subset_empty_iff.1 h
#align set.eq_empty_of_forall_not_mem Set.eq_empty_of_forall_not_mem
theorem eq_empty_of_subset_empty {s : Set α} : s ⊆ ∅ → s = ∅ :=
subset_empty_iff.1
#align set.eq_empty_of_subset_empty Set.eq_empty_of_subset_empty
theorem eq_empty_of_isEmpty [IsEmpty α] (s : Set α) : s = ∅ :=
eq_empty_of_subset_empty fun x _ => isEmptyElim x
#align set.eq_empty_of_is_empty Set.eq_empty_of_isEmpty
instance uniqueEmpty [IsEmpty α] : Unique (Set α) where
default := ∅
uniq := eq_empty_of_isEmpty
#align set.unique_empty Set.uniqueEmpty
theorem not_nonempty_iff_eq_empty {s : Set α} : ¬s.Nonempty ↔ s = ∅ := by
simp only [Set.Nonempty, not_exists, eq_empty_iff_forall_not_mem]
#align set.not_nonempty_iff_eq_empty Set.not_nonempty_iff_eq_empty
theorem nonempty_iff_ne_empty : s.Nonempty ↔ s ≠ ∅ :=
not_nonempty_iff_eq_empty.not_right
#align set.nonempty_iff_ne_empty Set.nonempty_iff_ne_empty
theorem not_nonempty_iff_eq_empty' : ¬Nonempty s ↔ s = ∅ := by
rw [nonempty_subtype, not_exists, eq_empty_iff_forall_not_mem]
theorem nonempty_iff_ne_empty' : Nonempty s ↔ s ≠ ∅ :=
not_nonempty_iff_eq_empty'.not_right
alias ⟨Nonempty.ne_empty, _⟩ := nonempty_iff_ne_empty
#align set.nonempty.ne_empty Set.Nonempty.ne_empty
@[simp]
theorem not_nonempty_empty : ¬(∅ : Set α).Nonempty := fun ⟨_, hx⟩ => hx
#align set.not_nonempty_empty Set.not_nonempty_empty
-- Porting note: removing `@[simp]` as it is competing with `isEmpty_subtype`.
-- @[simp]
theorem isEmpty_coe_sort {s : Set α} : IsEmpty (↥s) ↔ s = ∅ :=
not_iff_not.1 <| by simpa using nonempty_iff_ne_empty
#align set.is_empty_coe_sort Set.isEmpty_coe_sort
theorem eq_empty_or_nonempty (s : Set α) : s = ∅ ∨ s.Nonempty :=
or_iff_not_imp_left.2 nonempty_iff_ne_empty.2
#align set.eq_empty_or_nonempty Set.eq_empty_or_nonempty
theorem subset_eq_empty {s t : Set α} (h : t ⊆ s) (e : s = ∅) : t = ∅ :=
subset_empty_iff.1 <| e ▸ h
#align set.subset_eq_empty Set.subset_eq_empty
theorem forall_mem_empty {p : α → Prop} : (∀ x ∈ (∅ : Set α), p x) ↔ True :=
iff_true_intro fun _ => False.elim
#align set.ball_empty_iff Set.forall_mem_empty
@[deprecated (since := "2024-03-23")] alias ball_empty_iff := forall_mem_empty
instance (α : Type u) : IsEmpty.{u + 1} (↥(∅ : Set α)) :=
⟨fun x => x.2⟩
@[simp]
theorem empty_ssubset : ∅ ⊂ s ↔ s.Nonempty :=
(@bot_lt_iff_ne_bot (Set α) _ _ _).trans nonempty_iff_ne_empty.symm
#align set.empty_ssubset Set.empty_ssubset
alias ⟨_, Nonempty.empty_ssubset⟩ := empty_ssubset
#align set.nonempty.empty_ssubset Set.Nonempty.empty_ssubset
@[simp]
theorem setOf_true : { _x : α | True } = univ :=
rfl
#align set.set_of_true Set.setOf_true
@[simp] theorem setOf_top : { _x : α | ⊤ } = univ := rfl
@[simp]
theorem univ_eq_empty_iff : (univ : Set α) = ∅ ↔ IsEmpty α :=
eq_empty_iff_forall_not_mem.trans
⟨fun H => ⟨fun x => H x trivial⟩, fun H x _ => @IsEmpty.false α H x⟩
#align set.univ_eq_empty_iff Set.univ_eq_empty_iff
theorem empty_ne_univ [Nonempty α] : (∅ : Set α) ≠ univ := fun e =>
not_isEmpty_of_nonempty α <| univ_eq_empty_iff.1 e.symm
#align set.empty_ne_univ Set.empty_ne_univ
@[simp]
theorem subset_univ (s : Set α) : s ⊆ univ := fun _ _ => trivial
#align set.subset_univ Set.subset_univ
@[simp]
theorem univ_subset_iff {s : Set α} : univ ⊆ s ↔ s = univ :=
@top_le_iff _ _ _ s
#align set.univ_subset_iff Set.univ_subset_iff
alias ⟨eq_univ_of_univ_subset, _⟩ := univ_subset_iff
#align set.eq_univ_of_univ_subset Set.eq_univ_of_univ_subset
theorem eq_univ_iff_forall {s : Set α} : s = univ ↔ ∀ x, x ∈ s :=
univ_subset_iff.symm.trans <| forall_congr' fun _ => imp_iff_right trivial
#align set.eq_univ_iff_forall Set.eq_univ_iff_forall
theorem eq_univ_of_forall {s : Set α} : (∀ x, x ∈ s) → s = univ :=
eq_univ_iff_forall.2
#align set.eq_univ_of_forall Set.eq_univ_of_forall
theorem Nonempty.eq_univ [Subsingleton α] : s.Nonempty → s = univ := by
rintro ⟨x, hx⟩
exact eq_univ_of_forall fun y => by rwa [Subsingleton.elim y x]
#align set.nonempty.eq_univ Set.Nonempty.eq_univ
theorem eq_univ_of_subset {s t : Set α} (h : s ⊆ t) (hs : s = univ) : t = univ :=
eq_univ_of_univ_subset <| (hs ▸ h : univ ⊆ t)
#align set.eq_univ_of_subset Set.eq_univ_of_subset
theorem exists_mem_of_nonempty (α) : ∀ [Nonempty α], ∃ x : α, x ∈ (univ : Set α)
| ⟨x⟩ => ⟨x, trivial⟩
#align set.exists_mem_of_nonempty Set.exists_mem_of_nonempty
theorem ne_univ_iff_exists_not_mem {α : Type*} (s : Set α) : s ≠ univ ↔ ∃ a, a ∉ s := by
rw [← not_forall, ← eq_univ_iff_forall]
#align set.ne_univ_iff_exists_not_mem Set.ne_univ_iff_exists_not_mem
theorem not_subset_iff_exists_mem_not_mem {α : Type*} {s t : Set α} :
¬s ⊆ t ↔ ∃ x, x ∈ s ∧ x ∉ t := by simp [subset_def]
#align set.not_subset_iff_exists_mem_not_mem Set.not_subset_iff_exists_mem_not_mem
theorem univ_unique [Unique α] : @Set.univ α = {default} :=
Set.ext fun x => iff_of_true trivial <| Subsingleton.elim x default
#align set.univ_unique Set.univ_unique
theorem ssubset_univ_iff : s ⊂ univ ↔ s ≠ univ :=
lt_top_iff_ne_top
#align set.ssubset_univ_iff Set.ssubset_univ_iff
instance nontrivial_of_nonempty [Nonempty α] : Nontrivial (Set α) :=
⟨⟨∅, univ, empty_ne_univ⟩⟩
#align set.nontrivial_of_nonempty Set.nontrivial_of_nonempty
theorem union_def {s₁ s₂ : Set α} : s₁ ∪ s₂ = { a | a ∈ s₁ ∨ a ∈ s₂ } :=
rfl
#align set.union_def Set.union_def
theorem mem_union_left {x : α} {a : Set α} (b : Set α) : x ∈ a → x ∈ a ∪ b :=
Or.inl
#align set.mem_union_left Set.mem_union_left
theorem mem_union_right {x : α} {b : Set α} (a : Set α) : x ∈ b → x ∈ a ∪ b :=
Or.inr
#align set.mem_union_right Set.mem_union_right
theorem mem_or_mem_of_mem_union {x : α} {a b : Set α} (H : x ∈ a ∪ b) : x ∈ a ∨ x ∈ b :=
H
#align set.mem_or_mem_of_mem_union Set.mem_or_mem_of_mem_union
theorem MemUnion.elim {x : α} {a b : Set α} {P : Prop} (H₁ : x ∈ a ∪ b) (H₂ : x ∈ a → P)
(H₃ : x ∈ b → P) : P :=
Or.elim H₁ H₂ H₃
#align set.mem_union.elim Set.MemUnion.elim
@[simp]
theorem mem_union (x : α) (a b : Set α) : x ∈ a ∪ b ↔ x ∈ a ∨ x ∈ b :=
Iff.rfl
#align set.mem_union Set.mem_union
@[simp]
theorem union_self (a : Set α) : a ∪ a = a :=
ext fun _ => or_self_iff
#align set.union_self Set.union_self
@[simp]
theorem union_empty (a : Set α) : a ∪ ∅ = a :=
ext fun _ => or_false_iff _
#align set.union_empty Set.union_empty
@[simp]
theorem empty_union (a : Set α) : ∅ ∪ a = a :=
ext fun _ => false_or_iff _
#align set.empty_union Set.empty_union
theorem union_comm (a b : Set α) : a ∪ b = b ∪ a :=
ext fun _ => or_comm
#align set.union_comm Set.union_comm
theorem union_assoc (a b c : Set α) : a ∪ b ∪ c = a ∪ (b ∪ c) :=
ext fun _ => or_assoc
#align set.union_assoc Set.union_assoc
instance union_isAssoc : Std.Associative (α := Set α) (· ∪ ·) :=
⟨union_assoc⟩
#align set.union_is_assoc Set.union_isAssoc
instance union_isComm : Std.Commutative (α := Set α) (· ∪ ·) :=
⟨union_comm⟩
#align set.union_is_comm Set.union_isComm
theorem union_left_comm (s₁ s₂ s₃ : Set α) : s₁ ∪ (s₂ ∪ s₃) = s₂ ∪ (s₁ ∪ s₃) :=
ext fun _ => or_left_comm
#align set.union_left_comm Set.union_left_comm
theorem union_right_comm (s₁ s₂ s₃ : Set α) : s₁ ∪ s₂ ∪ s₃ = s₁ ∪ s₃ ∪ s₂ :=
ext fun _ => or_right_comm
#align set.union_right_comm Set.union_right_comm
@[simp]
theorem union_eq_left {s t : Set α} : s ∪ t = s ↔ t ⊆ s :=
sup_eq_left
#align set.union_eq_left_iff_subset Set.union_eq_left
@[simp]
theorem union_eq_right {s t : Set α} : s ∪ t = t ↔ s ⊆ t :=
sup_eq_right
#align set.union_eq_right_iff_subset Set.union_eq_right
theorem union_eq_self_of_subset_left {s t : Set α} (h : s ⊆ t) : s ∪ t = t :=
union_eq_right.mpr h
#align set.union_eq_self_of_subset_left Set.union_eq_self_of_subset_left
theorem union_eq_self_of_subset_right {s t : Set α} (h : t ⊆ s) : s ∪ t = s :=
union_eq_left.mpr h
#align set.union_eq_self_of_subset_right Set.union_eq_self_of_subset_right
@[simp]
theorem subset_union_left {s t : Set α} : s ⊆ s ∪ t := fun _ => Or.inl
#align set.subset_union_left Set.subset_union_left
@[simp]
theorem subset_union_right {s t : Set α} : t ⊆ s ∪ t := fun _ => Or.inr
#align set.subset_union_right Set.subset_union_right
theorem union_subset {s t r : Set α} (sr : s ⊆ r) (tr : t ⊆ r) : s ∪ t ⊆ r := fun _ =>
Or.rec (@sr _) (@tr _)
#align set.union_subset Set.union_subset
@[simp]
theorem union_subset_iff {s t u : Set α} : s ∪ t ⊆ u ↔ s ⊆ u ∧ t ⊆ u :=
(forall_congr' fun _ => or_imp).trans forall_and
#align set.union_subset_iff Set.union_subset_iff
@[gcongr]
theorem union_subset_union {s₁ s₂ t₁ t₂ : Set α} (h₁ : s₁ ⊆ s₂) (h₂ : t₁ ⊆ t₂) :
s₁ ∪ t₁ ⊆ s₂ ∪ t₂ := fun _ => Or.imp (@h₁ _) (@h₂ _)
#align set.union_subset_union Set.union_subset_union
@[gcongr]
theorem union_subset_union_left {s₁ s₂ : Set α} (t) (h : s₁ ⊆ s₂) : s₁ ∪ t ⊆ s₂ ∪ t :=
union_subset_union h Subset.rfl
#align set.union_subset_union_left Set.union_subset_union_left
@[gcongr]
theorem union_subset_union_right (s) {t₁ t₂ : Set α} (h : t₁ ⊆ t₂) : s ∪ t₁ ⊆ s ∪ t₂ :=
union_subset_union Subset.rfl h
#align set.union_subset_union_right Set.union_subset_union_right
theorem subset_union_of_subset_left {s t : Set α} (h : s ⊆ t) (u : Set α) : s ⊆ t ∪ u :=
h.trans subset_union_left
#align set.subset_union_of_subset_left Set.subset_union_of_subset_left
theorem subset_union_of_subset_right {s u : Set α} (h : s ⊆ u) (t : Set α) : s ⊆ t ∪ u :=
h.trans subset_union_right
#align set.subset_union_of_subset_right Set.subset_union_of_subset_right
-- Porting note: replaced `⊔` in RHS
theorem union_congr_left (ht : t ⊆ s ∪ u) (hu : u ⊆ s ∪ t) : s ∪ t = s ∪ u :=
sup_congr_left ht hu
#align set.union_congr_left Set.union_congr_left
theorem union_congr_right (hs : s ⊆ t ∪ u) (ht : t ⊆ s ∪ u) : s ∪ u = t ∪ u :=
sup_congr_right hs ht
#align set.union_congr_right Set.union_congr_right
theorem union_eq_union_iff_left : s ∪ t = s ∪ u ↔ t ⊆ s ∪ u ∧ u ⊆ s ∪ t :=
sup_eq_sup_iff_left
#align set.union_eq_union_iff_left Set.union_eq_union_iff_left
theorem union_eq_union_iff_right : s ∪ u = t ∪ u ↔ s ⊆ t ∪ u ∧ t ⊆ s ∪ u :=
sup_eq_sup_iff_right
#align set.union_eq_union_iff_right Set.union_eq_union_iff_right
@[simp]
theorem union_empty_iff {s t : Set α} : s ∪ t = ∅ ↔ s = ∅ ∧ t = ∅ := by
simp only [← subset_empty_iff]
exact union_subset_iff
#align set.union_empty_iff Set.union_empty_iff
@[simp]
theorem union_univ (s : Set α) : s ∪ univ = univ := sup_top_eq _
#align set.union_univ Set.union_univ
@[simp]
theorem univ_union (s : Set α) : univ ∪ s = univ := top_sup_eq _
#align set.univ_union Set.univ_union
theorem inter_def {s₁ s₂ : Set α} : s₁ ∩ s₂ = { a | a ∈ s₁ ∧ a ∈ s₂ } :=
rfl
#align set.inter_def Set.inter_def
@[simp, mfld_simps]
theorem mem_inter_iff (x : α) (a b : Set α) : x ∈ a ∩ b ↔ x ∈ a ∧ x ∈ b :=
Iff.rfl
#align set.mem_inter_iff Set.mem_inter_iff
theorem mem_inter {x : α} {a b : Set α} (ha : x ∈ a) (hb : x ∈ b) : x ∈ a ∩ b :=
⟨ha, hb⟩
#align set.mem_inter Set.mem_inter
theorem mem_of_mem_inter_left {x : α} {a b : Set α} (h : x ∈ a ∩ b) : x ∈ a :=
h.left
#align set.mem_of_mem_inter_left Set.mem_of_mem_inter_left
theorem mem_of_mem_inter_right {x : α} {a b : Set α} (h : x ∈ a ∩ b) : x ∈ b :=
h.right
#align set.mem_of_mem_inter_right Set.mem_of_mem_inter_right
@[simp]
theorem inter_self (a : Set α) : a ∩ a = a :=
ext fun _ => and_self_iff
#align set.inter_self Set.inter_self
@[simp]
theorem inter_empty (a : Set α) : a ∩ ∅ = ∅ :=
ext fun _ => and_false_iff _
#align set.inter_empty Set.inter_empty
@[simp]
theorem empty_inter (a : Set α) : ∅ ∩ a = ∅ :=
ext fun _ => false_and_iff _
#align set.empty_inter Set.empty_inter
theorem inter_comm (a b : Set α) : a ∩ b = b ∩ a :=
ext fun _ => and_comm
#align set.inter_comm Set.inter_comm
theorem inter_assoc (a b c : Set α) : a ∩ b ∩ c = a ∩ (b ∩ c) :=
ext fun _ => and_assoc
#align set.inter_assoc Set.inter_assoc
instance inter_isAssoc : Std.Associative (α := Set α) (· ∩ ·) :=
⟨inter_assoc⟩
#align set.inter_is_assoc Set.inter_isAssoc
instance inter_isComm : Std.Commutative (α := Set α) (· ∩ ·) :=
⟨inter_comm⟩
#align set.inter_is_comm Set.inter_isComm
theorem inter_left_comm (s₁ s₂ s₃ : Set α) : s₁ ∩ (s₂ ∩ s₃) = s₂ ∩ (s₁ ∩ s₃) :=
ext fun _ => and_left_comm
#align set.inter_left_comm Set.inter_left_comm
theorem inter_right_comm (s₁ s₂ s₃ : Set α) : s₁ ∩ s₂ ∩ s₃ = s₁ ∩ s₃ ∩ s₂ :=
ext fun _ => and_right_comm
#align set.inter_right_comm Set.inter_right_comm
@[simp, mfld_simps]
theorem inter_subset_left {s t : Set α} : s ∩ t ⊆ s := fun _ => And.left
#align set.inter_subset_left Set.inter_subset_left
@[simp]
theorem inter_subset_right {s t : Set α} : s ∩ t ⊆ t := fun _ => And.right
#align set.inter_subset_right Set.inter_subset_right
theorem subset_inter {s t r : Set α} (rs : r ⊆ s) (rt : r ⊆ t) : r ⊆ s ∩ t := fun _ h =>
⟨rs h, rt h⟩
#align set.subset_inter Set.subset_inter
@[simp]
theorem subset_inter_iff {s t r : Set α} : r ⊆ s ∩ t ↔ r ⊆ s ∧ r ⊆ t :=
(forall_congr' fun _ => imp_and).trans forall_and
#align set.subset_inter_iff Set.subset_inter_iff
@[simp] lemma inter_eq_left : s ∩ t = s ↔ s ⊆ t := inf_eq_left
#align set.inter_eq_left_iff_subset Set.inter_eq_left
@[simp] lemma inter_eq_right : s ∩ t = t ↔ t ⊆ s := inf_eq_right
#align set.inter_eq_right_iff_subset Set.inter_eq_right
@[simp] lemma left_eq_inter : s = s ∩ t ↔ s ⊆ t := left_eq_inf
@[simp] lemma right_eq_inter : t = s ∩ t ↔ t ⊆ s := right_eq_inf
theorem inter_eq_self_of_subset_left {s t : Set α} : s ⊆ t → s ∩ t = s :=
inter_eq_left.mpr
#align set.inter_eq_self_of_subset_left Set.inter_eq_self_of_subset_left
theorem inter_eq_self_of_subset_right {s t : Set α} : t ⊆ s → s ∩ t = t :=
inter_eq_right.mpr
#align set.inter_eq_self_of_subset_right Set.inter_eq_self_of_subset_right
theorem inter_congr_left (ht : s ∩ u ⊆ t) (hu : s ∩ t ⊆ u) : s ∩ t = s ∩ u :=
inf_congr_left ht hu
#align set.inter_congr_left Set.inter_congr_left
theorem inter_congr_right (hs : t ∩ u ⊆ s) (ht : s ∩ u ⊆ t) : s ∩ u = t ∩ u :=
inf_congr_right hs ht
#align set.inter_congr_right Set.inter_congr_right
theorem inter_eq_inter_iff_left : s ∩ t = s ∩ u ↔ s ∩ u ⊆ t ∧ s ∩ t ⊆ u :=
inf_eq_inf_iff_left
#align set.inter_eq_inter_iff_left Set.inter_eq_inter_iff_left
theorem inter_eq_inter_iff_right : s ∩ u = t ∩ u ↔ t ∩ u ⊆ s ∧ s ∩ u ⊆ t :=
inf_eq_inf_iff_right
#align set.inter_eq_inter_iff_right Set.inter_eq_inter_iff_right
@[simp, mfld_simps]
theorem inter_univ (a : Set α) : a ∩ univ = a := inf_top_eq _
#align set.inter_univ Set.inter_univ
@[simp, mfld_simps]
theorem univ_inter (a : Set α) : univ ∩ a = a := top_inf_eq _
#align set.univ_inter Set.univ_inter
@[gcongr]
theorem inter_subset_inter {s₁ s₂ t₁ t₂ : Set α} (h₁ : s₁ ⊆ t₁) (h₂ : s₂ ⊆ t₂) :
s₁ ∩ s₂ ⊆ t₁ ∩ t₂ := fun _ => And.imp (@h₁ _) (@h₂ _)
#align set.inter_subset_inter Set.inter_subset_inter
@[gcongr]
theorem inter_subset_inter_left {s t : Set α} (u : Set α) (H : s ⊆ t) : s ∩ u ⊆ t ∩ u :=
inter_subset_inter H Subset.rfl
#align set.inter_subset_inter_left Set.inter_subset_inter_left
@[gcongr]
theorem inter_subset_inter_right {s t : Set α} (u : Set α) (H : s ⊆ t) : u ∩ s ⊆ u ∩ t :=
inter_subset_inter Subset.rfl H
#align set.inter_subset_inter_right Set.inter_subset_inter_right
theorem union_inter_cancel_left {s t : Set α} : (s ∪ t) ∩ s = s :=
inter_eq_self_of_subset_right subset_union_left
#align set.union_inter_cancel_left Set.union_inter_cancel_left
theorem union_inter_cancel_right {s t : Set α} : (s ∪ t) ∩ t = t :=
inter_eq_self_of_subset_right subset_union_right
#align set.union_inter_cancel_right Set.union_inter_cancel_right
theorem inter_setOf_eq_sep (s : Set α) (p : α → Prop) : s ∩ {a | p a} = {a ∈ s | p a} :=
rfl
#align set.inter_set_of_eq_sep Set.inter_setOf_eq_sep
theorem setOf_inter_eq_sep (p : α → Prop) (s : Set α) : {a | p a} ∩ s = {a ∈ s | p a} :=
inter_comm _ _
#align set.set_of_inter_eq_sep Set.setOf_inter_eq_sep
theorem inter_union_distrib_left (s t u : Set α) : s ∩ (t ∪ u) = s ∩ t ∪ s ∩ u :=
inf_sup_left _ _ _
#align set.inter_distrib_left Set.inter_union_distrib_left
theorem union_inter_distrib_right (s t u : Set α) : (s ∪ t) ∩ u = s ∩ u ∪ t ∩ u :=
inf_sup_right _ _ _
#align set.inter_distrib_right Set.union_inter_distrib_right
theorem union_inter_distrib_left (s t u : Set α) : s ∪ t ∩ u = (s ∪ t) ∩ (s ∪ u) :=
sup_inf_left _ _ _
#align set.union_distrib_left Set.union_inter_distrib_left
theorem inter_union_distrib_right (s t u : Set α) : s ∩ t ∪ u = (s ∪ u) ∩ (t ∪ u) :=
sup_inf_right _ _ _
#align set.union_distrib_right Set.inter_union_distrib_right
-- 2024-03-22
@[deprecated] alias inter_distrib_left := inter_union_distrib_left
@[deprecated] alias inter_distrib_right := union_inter_distrib_right
@[deprecated] alias union_distrib_left := union_inter_distrib_left
@[deprecated] alias union_distrib_right := inter_union_distrib_right
theorem union_union_distrib_left (s t u : Set α) : s ∪ (t ∪ u) = s ∪ t ∪ (s ∪ u) :=
sup_sup_distrib_left _ _ _
#align set.union_union_distrib_left Set.union_union_distrib_left
theorem union_union_distrib_right (s t u : Set α) : s ∪ t ∪ u = s ∪ u ∪ (t ∪ u) :=
sup_sup_distrib_right _ _ _
#align set.union_union_distrib_right Set.union_union_distrib_right
theorem inter_inter_distrib_left (s t u : Set α) : s ∩ (t ∩ u) = s ∩ t ∩ (s ∩ u) :=
inf_inf_distrib_left _ _ _
#align set.inter_inter_distrib_left Set.inter_inter_distrib_left
theorem inter_inter_distrib_right (s t u : Set α) : s ∩ t ∩ u = s ∩ u ∩ (t ∩ u) :=
inf_inf_distrib_right _ _ _
#align set.inter_inter_distrib_right Set.inter_inter_distrib_right
theorem union_union_union_comm (s t u v : Set α) : s ∪ t ∪ (u ∪ v) = s ∪ u ∪ (t ∪ v) :=
sup_sup_sup_comm _ _ _ _
#align set.union_union_union_comm Set.union_union_union_comm
theorem inter_inter_inter_comm (s t u v : Set α) : s ∩ t ∩ (u ∩ v) = s ∩ u ∩ (t ∩ v) :=
inf_inf_inf_comm _ _ _ _
#align set.inter_inter_inter_comm Set.inter_inter_inter_comm
theorem insert_def (x : α) (s : Set α) : insert x s = { y | y = x ∨ y ∈ s } :=
rfl
#align set.insert_def Set.insert_def
@[simp]
theorem subset_insert (x : α) (s : Set α) : s ⊆ insert x s := fun _ => Or.inr
#align set.subset_insert Set.subset_insert
theorem mem_insert (x : α) (s : Set α) : x ∈ insert x s :=
Or.inl rfl
#align set.mem_insert Set.mem_insert
theorem mem_insert_of_mem {x : α} {s : Set α} (y : α) : x ∈ s → x ∈ insert y s :=
Or.inr
#align set.mem_insert_of_mem Set.mem_insert_of_mem
theorem eq_or_mem_of_mem_insert {x a : α} {s : Set α} : x ∈ insert a s → x = a ∨ x ∈ s :=
id
#align set.eq_or_mem_of_mem_insert Set.eq_or_mem_of_mem_insert
theorem mem_of_mem_insert_of_ne : b ∈ insert a s → b ≠ a → b ∈ s :=
Or.resolve_left
#align set.mem_of_mem_insert_of_ne Set.mem_of_mem_insert_of_ne
theorem eq_of_not_mem_of_mem_insert : b ∈ insert a s → b ∉ s → b = a :=
Or.resolve_right
#align set.eq_of_not_mem_of_mem_insert Set.eq_of_not_mem_of_mem_insert
@[simp]
theorem mem_insert_iff {x a : α} {s : Set α} : x ∈ insert a s ↔ x = a ∨ x ∈ s :=
Iff.rfl
#align set.mem_insert_iff Set.mem_insert_iff
@[simp]
theorem insert_eq_of_mem {a : α} {s : Set α} (h : a ∈ s) : insert a s = s :=
ext fun _ => or_iff_right_of_imp fun e => e.symm ▸ h
#align set.insert_eq_of_mem Set.insert_eq_of_mem
theorem ne_insert_of_not_mem {s : Set α} (t : Set α) {a : α} : a ∉ s → s ≠ insert a t :=
mt fun e => e.symm ▸ mem_insert _ _
#align set.ne_insert_of_not_mem Set.ne_insert_of_not_mem
@[simp]
theorem insert_eq_self : insert a s = s ↔ a ∈ s :=
⟨fun h => h ▸ mem_insert _ _, insert_eq_of_mem⟩
#align set.insert_eq_self Set.insert_eq_self
theorem insert_ne_self : insert a s ≠ s ↔ a ∉ s :=
insert_eq_self.not
#align set.insert_ne_self Set.insert_ne_self
theorem insert_subset_iff : insert a s ⊆ t ↔ a ∈ t ∧ s ⊆ t := by
simp only [subset_def, mem_insert_iff, or_imp, forall_and, forall_eq]
#align set.insert_subset Set.insert_subset_iff
theorem insert_subset (ha : a ∈ t) (hs : s ⊆ t) : insert a s ⊆ t :=
insert_subset_iff.mpr ⟨ha, hs⟩
theorem insert_subset_insert (h : s ⊆ t) : insert a s ⊆ insert a t := fun _ => Or.imp_right (@h _)
#align set.insert_subset_insert Set.insert_subset_insert
@[simp] theorem insert_subset_insert_iff (ha : a ∉ s) : insert a s ⊆ insert a t ↔ s ⊆ t := by
refine ⟨fun h x hx => ?_, insert_subset_insert⟩
rcases h (subset_insert _ _ hx) with (rfl | hxt)
exacts [(ha hx).elim, hxt]
#align set.insert_subset_insert_iff Set.insert_subset_insert_iff
theorem subset_insert_iff_of_not_mem (ha : a ∉ s) : s ⊆ insert a t ↔ s ⊆ t :=
forall₂_congr fun _ hb => or_iff_right <| ne_of_mem_of_not_mem hb ha
#align set.subset_insert_iff_of_not_mem Set.subset_insert_iff_of_not_mem
theorem ssubset_iff_insert {s t : Set α} : s ⊂ t ↔ ∃ a ∉ s, insert a s ⊆ t := by
simp only [insert_subset_iff, exists_and_right, ssubset_def, not_subset]
aesop
#align set.ssubset_iff_insert Set.ssubset_iff_insert
theorem ssubset_insert {s : Set α} {a : α} (h : a ∉ s) : s ⊂ insert a s :=
ssubset_iff_insert.2 ⟨a, h, Subset.rfl⟩
#align set.ssubset_insert Set.ssubset_insert
theorem insert_comm (a b : α) (s : Set α) : insert a (insert b s) = insert b (insert a s) :=
ext fun _ => or_left_comm
#align set.insert_comm Set.insert_comm
-- Porting note (#10618): removing `simp` attribute because `simp` can prove it
theorem insert_idem (a : α) (s : Set α) : insert a (insert a s) = insert a s :=
insert_eq_of_mem <| mem_insert _ _
#align set.insert_idem Set.insert_idem
theorem insert_union : insert a s ∪ t = insert a (s ∪ t) :=
ext fun _ => or_assoc
#align set.insert_union Set.insert_union
@[simp]
theorem union_insert : s ∪ insert a t = insert a (s ∪ t) :=
ext fun _ => or_left_comm
#align set.union_insert Set.union_insert
@[simp]
theorem insert_nonempty (a : α) (s : Set α) : (insert a s).Nonempty :=
⟨a, mem_insert a s⟩
#align set.insert_nonempty Set.insert_nonempty
instance (a : α) (s : Set α) : Nonempty (insert a s : Set α) :=
(insert_nonempty a s).to_subtype
theorem insert_inter_distrib (a : α) (s t : Set α) : insert a (s ∩ t) = insert a s ∩ insert a t :=
ext fun _ => or_and_left
#align set.insert_inter_distrib Set.insert_inter_distrib
theorem insert_union_distrib (a : α) (s t : Set α) : insert a (s ∪ t) = insert a s ∪ insert a t :=
ext fun _ => or_or_distrib_left
#align set.insert_union_distrib Set.insert_union_distrib
theorem insert_inj (ha : a ∉ s) : insert a s = insert b s ↔ a = b :=
⟨fun h => eq_of_not_mem_of_mem_insert (h.subst <| mem_insert a s) ha,
congr_arg (fun x => insert x s)⟩
#align set.insert_inj Set.insert_inj
-- useful in proofs by induction
theorem forall_of_forall_insert {P : α → Prop} {a : α} {s : Set α} (H : ∀ x, x ∈ insert a s → P x)
(x) (h : x ∈ s) : P x :=
H _ (Or.inr h)
#align set.forall_of_forall_insert Set.forall_of_forall_insert
theorem forall_insert_of_forall {P : α → Prop} {a : α} {s : Set α} (H : ∀ x, x ∈ s → P x) (ha : P a)
(x) (h : x ∈ insert a s) : P x :=
h.elim (fun e => e.symm ▸ ha) (H _)
#align set.forall_insert_of_forall Set.forall_insert_of_forall
theorem exists_mem_insert {P : α → Prop} {a : α} {s : Set α} :
(∃ x ∈ insert a s, P x) ↔ (P a ∨ ∃ x ∈ s, P x) := by
simp [mem_insert_iff, or_and_right, exists_and_left, exists_or]
#align set.bex_insert_iff Set.exists_mem_insert
@[deprecated (since := "2024-03-23")] alias bex_insert_iff := exists_mem_insert
theorem forall_mem_insert {P : α → Prop} {a : α} {s : Set α} :
(∀ x ∈ insert a s, P x) ↔ P a ∧ ∀ x ∈ s, P x :=
forall₂_or_left.trans <| and_congr_left' forall_eq
#align set.ball_insert_iff Set.forall_mem_insert
@[deprecated (since := "2024-03-23")] alias ball_insert_iff := forall_mem_insert
instance : LawfulSingleton α (Set α) :=
⟨fun x => Set.ext fun a => by
simp only [mem_empty_iff_false, mem_insert_iff, or_false]
exact Iff.rfl⟩
theorem singleton_def (a : α) : ({a} : Set α) = insert a ∅ :=
(insert_emptyc_eq a).symm
#align set.singleton_def Set.singleton_def
@[simp]
theorem mem_singleton_iff {a b : α} : a ∈ ({b} : Set α) ↔ a = b :=
Iff.rfl
#align set.mem_singleton_iff Set.mem_singleton_iff
@[simp]
theorem setOf_eq_eq_singleton {a : α} : { n | n = a } = {a} :=
rfl
#align set.set_of_eq_eq_singleton Set.setOf_eq_eq_singleton
@[simp]
theorem setOf_eq_eq_singleton' {a : α} : { x | a = x } = {a} :=
ext fun _ => eq_comm
#align set.set_of_eq_eq_singleton' Set.setOf_eq_eq_singleton'
-- TODO: again, annotation needed
--Porting note (#11119): removed `simp` attribute
theorem mem_singleton (a : α) : a ∈ ({a} : Set α) :=
@rfl _ _
#align set.mem_singleton Set.mem_singleton
theorem eq_of_mem_singleton {x y : α} (h : x ∈ ({y} : Set α)) : x = y :=
h
#align set.eq_of_mem_singleton Set.eq_of_mem_singleton
@[simp]
theorem singleton_eq_singleton_iff {x y : α} : {x} = ({y} : Set α) ↔ x = y :=
ext_iff.trans eq_iff_eq_cancel_left
#align set.singleton_eq_singleton_iff Set.singleton_eq_singleton_iff
theorem singleton_injective : Injective (singleton : α → Set α) := fun _ _ =>
singleton_eq_singleton_iff.mp
#align set.singleton_injective Set.singleton_injective
theorem mem_singleton_of_eq {x y : α} (H : x = y) : x ∈ ({y} : Set α) :=
H
#align set.mem_singleton_of_eq Set.mem_singleton_of_eq
theorem insert_eq (x : α) (s : Set α) : insert x s = ({x} : Set α) ∪ s :=
rfl
#align set.insert_eq Set.insert_eq
@[simp]
theorem singleton_nonempty (a : α) : ({a} : Set α).Nonempty :=
⟨a, rfl⟩
#align set.singleton_nonempty Set.singleton_nonempty
@[simp]
theorem singleton_ne_empty (a : α) : ({a} : Set α) ≠ ∅ :=
(singleton_nonempty _).ne_empty
#align set.singleton_ne_empty Set.singleton_ne_empty
--Porting note (#10618): removed `simp` attribute because `simp` can prove it
theorem empty_ssubset_singleton : (∅ : Set α) ⊂ {a} :=
(singleton_nonempty _).empty_ssubset
#align set.empty_ssubset_singleton Set.empty_ssubset_singleton
@[simp]
theorem singleton_subset_iff {a : α} {s : Set α} : {a} ⊆ s ↔ a ∈ s :=
forall_eq
#align set.singleton_subset_iff Set.singleton_subset_iff
theorem singleton_subset_singleton : ({a} : Set α) ⊆ {b} ↔ a = b := by simp
#align set.singleton_subset_singleton Set.singleton_subset_singleton
theorem set_compr_eq_eq_singleton {a : α} : { b | b = a } = {a} :=
rfl
#align set.set_compr_eq_eq_singleton Set.set_compr_eq_eq_singleton
@[simp]
theorem singleton_union : {a} ∪ s = insert a s :=
rfl
#align set.singleton_union Set.singleton_union
@[simp]
theorem union_singleton : s ∪ {a} = insert a s :=
union_comm _ _
#align set.union_singleton Set.union_singleton
@[simp]
theorem singleton_inter_nonempty : ({a} ∩ s).Nonempty ↔ a ∈ s := by
simp only [Set.Nonempty, mem_inter_iff, mem_singleton_iff, exists_eq_left]
#align set.singleton_inter_nonempty Set.singleton_inter_nonempty
@[simp]
theorem inter_singleton_nonempty : (s ∩ {a}).Nonempty ↔ a ∈ s := by
rw [inter_comm, singleton_inter_nonempty]
#align set.inter_singleton_nonempty Set.inter_singleton_nonempty
@[simp]
theorem singleton_inter_eq_empty : {a} ∩ s = ∅ ↔ a ∉ s :=
not_nonempty_iff_eq_empty.symm.trans singleton_inter_nonempty.not
#align set.singleton_inter_eq_empty Set.singleton_inter_eq_empty
@[simp]
theorem inter_singleton_eq_empty : s ∩ {a} = ∅ ↔ a ∉ s := by
rw [inter_comm, singleton_inter_eq_empty]
#align set.inter_singleton_eq_empty Set.inter_singleton_eq_empty
theorem nmem_singleton_empty {s : Set α} : s ∉ ({∅} : Set (Set α)) ↔ s.Nonempty :=
nonempty_iff_ne_empty.symm
#align set.nmem_singleton_empty Set.nmem_singleton_empty
instance uniqueSingleton (a : α) : Unique (↥({a} : Set α)) :=
⟨⟨⟨a, mem_singleton a⟩⟩, fun ⟨_, h⟩ => Subtype.eq h⟩
#align set.unique_singleton Set.uniqueSingleton
theorem eq_singleton_iff_unique_mem : s = {a} ↔ a ∈ s ∧ ∀ x ∈ s, x = a :=
Subset.antisymm_iff.trans <| and_comm.trans <| and_congr_left' singleton_subset_iff
#align set.eq_singleton_iff_unique_mem Set.eq_singleton_iff_unique_mem
theorem eq_singleton_iff_nonempty_unique_mem : s = {a} ↔ s.Nonempty ∧ ∀ x ∈ s, x = a :=
eq_singleton_iff_unique_mem.trans <|
and_congr_left fun H => ⟨fun h' => ⟨_, h'⟩, fun ⟨x, h⟩ => H x h ▸ h⟩
#align set.eq_singleton_iff_nonempty_unique_mem Set.eq_singleton_iff_nonempty_unique_mem
set_option backward.synthInstance.canonInstances false in -- See https://github.com/leanprover-community/mathlib4/issues/12532
-- while `simp` is capable of proving this, it is not capable of turning the LHS into the RHS.
@[simp]
theorem default_coe_singleton (x : α) : (default : ({x} : Set α)) = ⟨x, rfl⟩ :=
rfl
#align set.default_coe_singleton Set.default_coe_singleton
@[simp]
theorem subset_singleton_iff {α : Type*} {s : Set α} {x : α} : s ⊆ {x} ↔ ∀ y ∈ s, y = x :=
Iff.rfl
#align set.subset_singleton_iff Set.subset_singleton_iff
theorem subset_singleton_iff_eq {s : Set α} {x : α} : s ⊆ {x} ↔ s = ∅ ∨ s = {x} := by
obtain rfl | hs := s.eq_empty_or_nonempty
· exact ⟨fun _ => Or.inl rfl, fun _ => empty_subset _⟩
· simp [eq_singleton_iff_nonempty_unique_mem, hs, hs.ne_empty]
#align set.subset_singleton_iff_eq Set.subset_singleton_iff_eq
theorem Nonempty.subset_singleton_iff (h : s.Nonempty) : s ⊆ {a} ↔ s = {a} :=
subset_singleton_iff_eq.trans <| or_iff_right h.ne_empty
#align set.nonempty.subset_singleton_iff Set.Nonempty.subset_singleton_iff
theorem ssubset_singleton_iff {s : Set α} {x : α} : s ⊂ {x} ↔ s = ∅ := by
rw [ssubset_iff_subset_ne, subset_singleton_iff_eq, or_and_right, and_not_self_iff, or_false_iff,
and_iff_left_iff_imp]
exact fun h => h ▸ (singleton_ne_empty _).symm
#align set.ssubset_singleton_iff Set.ssubset_singleton_iff
theorem eq_empty_of_ssubset_singleton {s : Set α} {x : α} (hs : s ⊂ {x}) : s = ∅ :=
ssubset_singleton_iff.1 hs
#align set.eq_empty_of_ssubset_singleton Set.eq_empty_of_ssubset_singleton
theorem eq_of_nonempty_of_subsingleton {α} [Subsingleton α] (s t : Set α) [Nonempty s]
[Nonempty t] : s = t :=
nonempty_of_nonempty_subtype.eq_univ.trans nonempty_of_nonempty_subtype.eq_univ.symm
theorem eq_of_nonempty_of_subsingleton' {α} [Subsingleton α] {s : Set α} (t : Set α)
(hs : s.Nonempty) [Nonempty t] : s = t :=
have := hs.to_subtype; eq_of_nonempty_of_subsingleton s t
set_option backward.synthInstance.canonInstances false in -- See https://github.com/leanprover-community/mathlib4/issues/12532
theorem Nonempty.eq_zero [Subsingleton α] [Zero α] {s : Set α} (h : s.Nonempty) :
s = {0} := eq_of_nonempty_of_subsingleton' {0} h
set_option backward.synthInstance.canonInstances false in -- See https://github.com/leanprover-community/mathlib4/issues/12532
theorem Nonempty.eq_one [Subsingleton α] [One α] {s : Set α} (h : s.Nonempty) :
s = {1} := eq_of_nonempty_of_subsingleton' {1} h
protected theorem disjoint_iff : Disjoint s t ↔ s ∩ t ⊆ ∅ :=
disjoint_iff_inf_le
#align set.disjoint_iff Set.disjoint_iff
theorem disjoint_iff_inter_eq_empty : Disjoint s t ↔ s ∩ t = ∅ :=
disjoint_iff
#align set.disjoint_iff_inter_eq_empty Set.disjoint_iff_inter_eq_empty
theorem _root_.Disjoint.inter_eq : Disjoint s t → s ∩ t = ∅ :=
Disjoint.eq_bot
#align disjoint.inter_eq Disjoint.inter_eq
theorem disjoint_left : Disjoint s t ↔ ∀ ⦃a⦄, a ∈ s → a ∉ t :=
disjoint_iff_inf_le.trans <| forall_congr' fun _ => not_and
#align set.disjoint_left Set.disjoint_left
theorem disjoint_right : Disjoint s t ↔ ∀ ⦃a⦄, a ∈ t → a ∉ s := by rw [disjoint_comm, disjoint_left]
#align set.disjoint_right Set.disjoint_right
lemma not_disjoint_iff : ¬Disjoint s t ↔ ∃ x, x ∈ s ∧ x ∈ t :=
Set.disjoint_iff.not.trans <| not_forall.trans <| exists_congr fun _ ↦ not_not
#align set.not_disjoint_iff Set.not_disjoint_iff
lemma not_disjoint_iff_nonempty_inter : ¬ Disjoint s t ↔ (s ∩ t).Nonempty := not_disjoint_iff
#align set.not_disjoint_iff_nonempty_inter Set.not_disjoint_iff_nonempty_inter
alias ⟨_, Nonempty.not_disjoint⟩ := not_disjoint_iff_nonempty_inter
#align set.nonempty.not_disjoint Set.Nonempty.not_disjoint
lemma disjoint_or_nonempty_inter (s t : Set α) : Disjoint s t ∨ (s ∩ t).Nonempty :=
(em _).imp_right not_disjoint_iff_nonempty_inter.1
#align set.disjoint_or_nonempty_inter Set.disjoint_or_nonempty_inter
lemma disjoint_iff_forall_ne : Disjoint s t ↔ ∀ ⦃a⦄, a ∈ s → ∀ ⦃b⦄, b ∈ t → a ≠ b := by
simp only [Ne, disjoint_left, @imp_not_comm _ (_ = _), forall_eq']
#align set.disjoint_iff_forall_ne Set.disjoint_iff_forall_ne
alias ⟨_root_.Disjoint.ne_of_mem, _⟩ := disjoint_iff_forall_ne
#align disjoint.ne_of_mem Disjoint.ne_of_mem
lemma disjoint_of_subset_left (h : s ⊆ u) (d : Disjoint u t) : Disjoint s t := d.mono_left h
#align set.disjoint_of_subset_left Set.disjoint_of_subset_left
lemma disjoint_of_subset_right (h : t ⊆ u) (d : Disjoint s u) : Disjoint s t := d.mono_right h
#align set.disjoint_of_subset_right Set.disjoint_of_subset_right
lemma disjoint_of_subset (hs : s₁ ⊆ s₂) (ht : t₁ ⊆ t₂) (h : Disjoint s₂ t₂) : Disjoint s₁ t₁ :=
h.mono hs ht
#align set.disjoint_of_subset Set.disjoint_of_subset
@[simp]
lemma disjoint_union_left : Disjoint (s ∪ t) u ↔ Disjoint s u ∧ Disjoint t u := disjoint_sup_left
#align set.disjoint_union_left Set.disjoint_union_left
@[simp]
lemma disjoint_union_right : Disjoint s (t ∪ u) ↔ Disjoint s t ∧ Disjoint s u := disjoint_sup_right
#align set.disjoint_union_right Set.disjoint_union_right
@[simp] lemma disjoint_empty (s : Set α) : Disjoint s ∅ := disjoint_bot_right
#align set.disjoint_empty Set.disjoint_empty
@[simp] lemma empty_disjoint (s : Set α) : Disjoint ∅ s := disjoint_bot_left
#align set.empty_disjoint Set.empty_disjoint
@[simp] lemma univ_disjoint : Disjoint univ s ↔ s = ∅ := top_disjoint
#align set.univ_disjoint Set.univ_disjoint
@[simp] lemma disjoint_univ : Disjoint s univ ↔ s = ∅ := disjoint_top
#align set.disjoint_univ Set.disjoint_univ
lemma disjoint_sdiff_left : Disjoint (t \ s) s := disjoint_sdiff_self_left
#align set.disjoint_sdiff_left Set.disjoint_sdiff_left
lemma disjoint_sdiff_right : Disjoint s (t \ s) := disjoint_sdiff_self_right
#align set.disjoint_sdiff_right Set.disjoint_sdiff_right
-- TODO: prove this in terms of a lattice lemma
theorem disjoint_sdiff_inter : Disjoint (s \ t) (s ∩ t) :=
disjoint_of_subset_right inter_subset_right disjoint_sdiff_left
#align set.disjoint_sdiff_inter Set.disjoint_sdiff_inter
theorem diff_union_diff_cancel (hts : t ⊆ s) (hut : u ⊆ t) : s \ t ∪ t \ u = s \ u :=
sdiff_sup_sdiff_cancel hts hut
#align set.diff_union_diff_cancel Set.diff_union_diff_cancel
theorem diff_diff_eq_sdiff_union (h : u ⊆ s) : s \ (t \ u) = s \ t ∪ u := sdiff_sdiff_eq_sdiff_sup h
#align set.diff_diff_eq_sdiff_union Set.diff_diff_eq_sdiff_union
@[simp default+1]
lemma disjoint_singleton_left : Disjoint {a} s ↔ a ∉ s := by simp [Set.disjoint_iff, subset_def]
#align set.disjoint_singleton_left Set.disjoint_singleton_left
@[simp]
lemma disjoint_singleton_right : Disjoint s {a} ↔ a ∉ s :=
disjoint_comm.trans disjoint_singleton_left
#align set.disjoint_singleton_right Set.disjoint_singleton_right
lemma disjoint_singleton : Disjoint ({a} : Set α) {b} ↔ a ≠ b := by
simp
#align set.disjoint_singleton Set.disjoint_singleton
lemma subset_diff : s ⊆ t \ u ↔ s ⊆ t ∧ Disjoint s u := le_iff_subset.symm.trans le_sdiff
#align set.subset_diff Set.subset_diff
lemma ssubset_iff_sdiff_singleton : s ⊂ t ↔ ∃ a ∈ t, s ⊆ t \ {a} := by
simp [ssubset_iff_insert, subset_diff, insert_subset_iff]; aesop
theorem inter_diff_distrib_left (s t u : Set α) : s ∩ (t \ u) = (s ∩ t) \ (s ∩ u) :=
inf_sdiff_distrib_left _ _ _
#align set.inter_diff_distrib_left Set.inter_diff_distrib_left
theorem inter_diff_distrib_right (s t u : Set α) : s \ t ∩ u = (s ∩ u) \ (t ∩ u) :=
inf_sdiff_distrib_right _ _ _
#align set.inter_diff_distrib_right Set.inter_diff_distrib_right
theorem compl_def (s : Set α) : sᶜ = { x | x ∉ s } :=
rfl
#align set.compl_def Set.compl_def
theorem mem_compl {s : Set α} {x : α} (h : x ∉ s) : x ∈ sᶜ :=
h
#align set.mem_compl Set.mem_compl
theorem compl_setOf {α} (p : α → Prop) : { a | p a }ᶜ = { a | ¬p a } :=
rfl
#align set.compl_set_of Set.compl_setOf
theorem not_mem_of_mem_compl {s : Set α} {x : α} (h : x ∈ sᶜ) : x ∉ s :=
h
#align set.not_mem_of_mem_compl Set.not_mem_of_mem_compl
theorem not_mem_compl_iff {x : α} : x ∉ sᶜ ↔ x ∈ s :=
not_not
#align set.not_mem_compl_iff Set.not_mem_compl_iff
@[simp]
theorem inter_compl_self (s : Set α) : s ∩ sᶜ = ∅ :=
inf_compl_eq_bot
#align set.inter_compl_self Set.inter_compl_self
@[simp]
theorem compl_inter_self (s : Set α) : sᶜ ∩ s = ∅ :=
compl_inf_eq_bot
#align set.compl_inter_self Set.compl_inter_self
@[simp]
theorem compl_empty : (∅ : Set α)ᶜ = univ :=
compl_bot
#align set.compl_empty Set.compl_empty
@[simp]
theorem compl_union (s t : Set α) : (s ∪ t)ᶜ = sᶜ ∩ tᶜ :=
compl_sup
#align set.compl_union Set.compl_union
theorem compl_inter (s t : Set α) : (s ∩ t)ᶜ = sᶜ ∪ tᶜ :=
compl_inf
#align set.compl_inter Set.compl_inter
@[simp]
theorem compl_univ : (univ : Set α)ᶜ = ∅ :=
compl_top
#align set.compl_univ Set.compl_univ
@[simp]
theorem compl_empty_iff {s : Set α} : sᶜ = ∅ ↔ s = univ :=
compl_eq_bot
#align set.compl_empty_iff Set.compl_empty_iff
@[simp]
theorem compl_univ_iff {s : Set α} : sᶜ = univ ↔ s = ∅ :=
compl_eq_top
#align set.compl_univ_iff Set.compl_univ_iff
theorem compl_ne_univ : sᶜ ≠ univ ↔ s.Nonempty :=
compl_univ_iff.not.trans nonempty_iff_ne_empty.symm
#align set.compl_ne_univ Set.compl_ne_univ
theorem nonempty_compl : sᶜ.Nonempty ↔ s ≠ univ :=
(ne_univ_iff_exists_not_mem s).symm
#align set.nonempty_compl Set.nonempty_compl
@[simp] lemma nonempty_compl_of_nontrivial [Nontrivial α] (x : α) : Set.Nonempty {x}ᶜ := by
obtain ⟨y, hy⟩ := exists_ne x
exact ⟨y, by simp [hy]⟩
theorem mem_compl_singleton_iff {a x : α} : x ∈ ({a} : Set α)ᶜ ↔ x ≠ a :=
Iff.rfl
#align set.mem_compl_singleton_iff Set.mem_compl_singleton_iff
theorem compl_singleton_eq (a : α) : ({a} : Set α)ᶜ = { x | x ≠ a } :=
rfl
#align set.compl_singleton_eq Set.compl_singleton_eq
@[simp]
theorem compl_ne_eq_singleton (a : α) : ({ x | x ≠ a } : Set α)ᶜ = {a} :=
compl_compl _
#align set.compl_ne_eq_singleton Set.compl_ne_eq_singleton
theorem union_eq_compl_compl_inter_compl (s t : Set α) : s ∪ t = (sᶜ ∩ tᶜ)ᶜ :=
ext fun _ => or_iff_not_and_not
#align set.union_eq_compl_compl_inter_compl Set.union_eq_compl_compl_inter_compl
theorem inter_eq_compl_compl_union_compl (s t : Set α) : s ∩ t = (sᶜ ∪ tᶜ)ᶜ :=
ext fun _ => and_iff_not_or_not
#align set.inter_eq_compl_compl_union_compl Set.inter_eq_compl_compl_union_compl
@[simp]
theorem union_compl_self (s : Set α) : s ∪ sᶜ = univ :=
eq_univ_iff_forall.2 fun _ => em _
#align set.union_compl_self Set.union_compl_self
@[simp]
theorem compl_union_self (s : Set α) : sᶜ ∪ s = univ := by rw [union_comm, union_compl_self]
#align set.compl_union_self Set.compl_union_self
theorem compl_subset_comm : sᶜ ⊆ t ↔ tᶜ ⊆ s :=
@compl_le_iff_compl_le _ s _ _
#align set.compl_subset_comm Set.compl_subset_comm
theorem subset_compl_comm : s ⊆ tᶜ ↔ t ⊆ sᶜ :=
@le_compl_iff_le_compl _ _ _ t
#align set.subset_compl_comm Set.subset_compl_comm
@[simp]
theorem compl_subset_compl : sᶜ ⊆ tᶜ ↔ t ⊆ s :=
@compl_le_compl_iff_le (Set α) _ _ _
#align set.compl_subset_compl Set.compl_subset_compl
@[gcongr] theorem compl_subset_compl_of_subset (h : t ⊆ s) : sᶜ ⊆ tᶜ := compl_subset_compl.2 h
theorem subset_compl_iff_disjoint_left : s ⊆ tᶜ ↔ Disjoint t s :=
@le_compl_iff_disjoint_left (Set α) _ _ _
#align set.subset_compl_iff_disjoint_left Set.subset_compl_iff_disjoint_left
theorem subset_compl_iff_disjoint_right : s ⊆ tᶜ ↔ Disjoint s t :=
@le_compl_iff_disjoint_right (Set α) _ _ _
#align set.subset_compl_iff_disjoint_right Set.subset_compl_iff_disjoint_right
theorem disjoint_compl_left_iff_subset : Disjoint sᶜ t ↔ t ⊆ s :=
disjoint_compl_left_iff
#align set.disjoint_compl_left_iff_subset Set.disjoint_compl_left_iff_subset
theorem disjoint_compl_right_iff_subset : Disjoint s tᶜ ↔ s ⊆ t :=
disjoint_compl_right_iff
#align set.disjoint_compl_right_iff_subset Set.disjoint_compl_right_iff_subset
alias ⟨_, _root_.Disjoint.subset_compl_right⟩ := subset_compl_iff_disjoint_right
#align disjoint.subset_compl_right Disjoint.subset_compl_right
alias ⟨_, _root_.Disjoint.subset_compl_left⟩ := subset_compl_iff_disjoint_left
#align disjoint.subset_compl_left Disjoint.subset_compl_left
alias ⟨_, _root_.HasSubset.Subset.disjoint_compl_left⟩ := disjoint_compl_left_iff_subset
#align has_subset.subset.disjoint_compl_left HasSubset.Subset.disjoint_compl_left
alias ⟨_, _root_.HasSubset.Subset.disjoint_compl_right⟩ := disjoint_compl_right_iff_subset
#align has_subset.subset.disjoint_compl_right HasSubset.Subset.disjoint_compl_right
theorem subset_union_compl_iff_inter_subset {s t u : Set α} : s ⊆ t ∪ uᶜ ↔ s ∩ u ⊆ t :=
(@isCompl_compl _ u _).le_sup_right_iff_inf_left_le
#align set.subset_union_compl_iff_inter_subset Set.subset_union_compl_iff_inter_subset
theorem compl_subset_iff_union {s t : Set α} : sᶜ ⊆ t ↔ s ∪ t = univ :=
Iff.symm <| eq_univ_iff_forall.trans <| forall_congr' fun _ => or_iff_not_imp_left
#align set.compl_subset_iff_union Set.compl_subset_iff_union
@[simp]
theorem subset_compl_singleton_iff {a : α} {s : Set α} : s ⊆ {a}ᶜ ↔ a ∉ s :=
subset_compl_comm.trans singleton_subset_iff
#align set.subset_compl_singleton_iff Set.subset_compl_singleton_iff
theorem inter_subset (a b c : Set α) : a ∩ b ⊆ c ↔ a ⊆ bᶜ ∪ c :=
forall_congr' fun _ => and_imp.trans <| imp_congr_right fun _ => imp_iff_not_or
#align set.inter_subset Set.inter_subset
theorem inter_compl_nonempty_iff {s t : Set α} : (s ∩ tᶜ).Nonempty ↔ ¬s ⊆ t :=
(not_subset.trans <| exists_congr fun x => by simp [mem_compl]).symm
#align set.inter_compl_nonempty_iff Set.inter_compl_nonempty_iff
theorem not_mem_diff_of_mem {s t : Set α} {x : α} (hx : x ∈ t) : x ∉ s \ t := fun h => h.2 hx
#align set.not_mem_diff_of_mem Set.not_mem_diff_of_mem
theorem mem_of_mem_diff {s t : Set α} {x : α} (h : x ∈ s \ t) : x ∈ s :=
h.left
#align set.mem_of_mem_diff Set.mem_of_mem_diff
theorem not_mem_of_mem_diff {s t : Set α} {x : α} (h : x ∈ s \ t) : x ∉ t :=
h.right
#align set.not_mem_of_mem_diff Set.not_mem_of_mem_diff
theorem diff_eq_compl_inter {s t : Set α} : s \ t = tᶜ ∩ s := by rw [diff_eq, inter_comm]
#align set.diff_eq_compl_inter Set.diff_eq_compl_inter
theorem nonempty_diff {s t : Set α} : (s \ t).Nonempty ↔ ¬s ⊆ t :=
inter_compl_nonempty_iff
#align set.nonempty_diff Set.nonempty_diff
theorem diff_subset {s t : Set α} : s \ t ⊆ s := show s \ t ≤ s from sdiff_le
#align set.diff_subset Set.diff_subset
theorem diff_subset_compl (s t : Set α) : s \ t ⊆ tᶜ :=
diff_eq_compl_inter ▸ inter_subset_left
theorem union_diff_cancel' {s t u : Set α} (h₁ : s ⊆ t) (h₂ : t ⊆ u) : t ∪ u \ s = u :=
sup_sdiff_cancel' h₁ h₂
#align set.union_diff_cancel' Set.union_diff_cancel'
theorem union_diff_cancel {s t : Set α} (h : s ⊆ t) : s ∪ t \ s = t :=
sup_sdiff_cancel_right h
#align set.union_diff_cancel Set.union_diff_cancel
theorem union_diff_cancel_left {s t : Set α} (h : s ∩ t ⊆ ∅) : (s ∪ t) \ s = t :=
Disjoint.sup_sdiff_cancel_left <| disjoint_iff_inf_le.2 h
#align set.union_diff_cancel_left Set.union_diff_cancel_left
theorem union_diff_cancel_right {s t : Set α} (h : s ∩ t ⊆ ∅) : (s ∪ t) \ t = s :=
Disjoint.sup_sdiff_cancel_right <| disjoint_iff_inf_le.2 h
#align set.union_diff_cancel_right Set.union_diff_cancel_right
@[simp]
theorem union_diff_left {s t : Set α} : (s ∪ t) \ s = t \ s :=
sup_sdiff_left_self
#align set.union_diff_left Set.union_diff_left
@[simp]
theorem union_diff_right {s t : Set α} : (s ∪ t) \ t = s \ t :=
sup_sdiff_right_self
#align set.union_diff_right Set.union_diff_right
theorem union_diff_distrib {s t u : Set α} : (s ∪ t) \ u = s \ u ∪ t \ u :=
sup_sdiff
#align set.union_diff_distrib Set.union_diff_distrib
theorem inter_diff_assoc (a b c : Set α) : (a ∩ b) \ c = a ∩ (b \ c) :=
inf_sdiff_assoc
#align set.inter_diff_assoc Set.inter_diff_assoc
@[simp]
theorem inter_diff_self (a b : Set α) : a ∩ (b \ a) = ∅ :=
inf_sdiff_self_right
#align set.inter_diff_self Set.inter_diff_self
@[simp]
theorem inter_union_diff (s t : Set α) : s ∩ t ∪ s \ t = s :=
sup_inf_sdiff s t
#align set.inter_union_diff Set.inter_union_diff
@[simp]
theorem diff_union_inter (s t : Set α) : s \ t ∪ s ∩ t = s := by
rw [union_comm]
exact sup_inf_sdiff _ _
#align set.diff_union_inter Set.diff_union_inter
@[simp]
theorem inter_union_compl (s t : Set α) : s ∩ t ∪ s ∩ tᶜ = s :=
inter_union_diff _ _
#align set.inter_union_compl Set.inter_union_compl
@[gcongr]
theorem diff_subset_diff {s₁ s₂ t₁ t₂ : Set α} : s₁ ⊆ s₂ → t₂ ⊆ t₁ → s₁ \ t₁ ⊆ s₂ \ t₂ :=
show s₁ ≤ s₂ → t₂ ≤ t₁ → s₁ \ t₁ ≤ s₂ \ t₂ from sdiff_le_sdiff
#align set.diff_subset_diff Set.diff_subset_diff
@[gcongr]
theorem diff_subset_diff_left {s₁ s₂ t : Set α} (h : s₁ ⊆ s₂) : s₁ \ t ⊆ s₂ \ t :=
sdiff_le_sdiff_right ‹s₁ ≤ s₂›
#align set.diff_subset_diff_left Set.diff_subset_diff_left
@[gcongr]
theorem diff_subset_diff_right {s t u : Set α} (h : t ⊆ u) : s \ u ⊆ s \ t :=
sdiff_le_sdiff_left ‹t ≤ u›
#align set.diff_subset_diff_right Set.diff_subset_diff_right
theorem compl_eq_univ_diff (s : Set α) : sᶜ = univ \ s :=
top_sdiff.symm
#align set.compl_eq_univ_diff Set.compl_eq_univ_diff
@[simp]
theorem empty_diff (s : Set α) : (∅ \ s : Set α) = ∅ :=
bot_sdiff
#align set.empty_diff Set.empty_diff
theorem diff_eq_empty {s t : Set α} : s \ t = ∅ ↔ s ⊆ t :=
sdiff_eq_bot_iff
#align set.diff_eq_empty Set.diff_eq_empty
@[simp]
theorem diff_empty {s : Set α} : s \ ∅ = s :=
sdiff_bot
#align set.diff_empty Set.diff_empty
@[simp]
theorem diff_univ (s : Set α) : s \ univ = ∅ :=
diff_eq_empty.2 (subset_univ s)
#align set.diff_univ Set.diff_univ
theorem diff_diff {u : Set α} : (s \ t) \ u = s \ (t ∪ u) :=
sdiff_sdiff_left
#align set.diff_diff Set.diff_diff
-- the following statement contains parentheses to help the reader
theorem diff_diff_comm {s t u : Set α} : (s \ t) \ u = (s \ u) \ t :=
sdiff_sdiff_comm
#align set.diff_diff_comm Set.diff_diff_comm
theorem diff_subset_iff {s t u : Set α} : s \ t ⊆ u ↔ s ⊆ t ∪ u :=
show s \ t ≤ u ↔ s ≤ t ∪ u from sdiff_le_iff
#align set.diff_subset_iff Set.diff_subset_iff
theorem subset_diff_union (s t : Set α) : s ⊆ s \ t ∪ t :=
show s ≤ s \ t ∪ t from le_sdiff_sup
#align set.subset_diff_union Set.subset_diff_union
theorem diff_union_of_subset {s t : Set α} (h : t ⊆ s) : s \ t ∪ t = s :=
Subset.antisymm (union_subset diff_subset h) (subset_diff_union _ _)
#align set.diff_union_of_subset Set.diff_union_of_subset
@[simp]
theorem diff_singleton_subset_iff {x : α} {s t : Set α} : s \ {x} ⊆ t ↔ s ⊆ insert x t := by
rw [← union_singleton, union_comm]
apply diff_subset_iff
#align set.diff_singleton_subset_iff Set.diff_singleton_subset_iff
theorem subset_diff_singleton {x : α} {s t : Set α} (h : s ⊆ t) (hx : x ∉ s) : s ⊆ t \ {x} :=
subset_inter h <| subset_compl_comm.1 <| singleton_subset_iff.2 hx
#align set.subset_diff_singleton Set.subset_diff_singleton
theorem subset_insert_diff_singleton (x : α) (s : Set α) : s ⊆ insert x (s \ {x}) := by
rw [← diff_singleton_subset_iff]
#align set.subset_insert_diff_singleton Set.subset_insert_diff_singleton
theorem diff_subset_comm {s t u : Set α} : s \ t ⊆ u ↔ s \ u ⊆ t :=
show s \ t ≤ u ↔ s \ u ≤ t from sdiff_le_comm
#align set.diff_subset_comm Set.diff_subset_comm
theorem diff_inter {s t u : Set α} : s \ (t ∩ u) = s \ t ∪ s \ u :=
sdiff_inf
#align set.diff_inter Set.diff_inter
theorem diff_inter_diff {s t u : Set α} : s \ t ∩ (s \ u) = s \ (t ∪ u) :=
sdiff_sup.symm
#align set.diff_inter_diff Set.diff_inter_diff
theorem diff_compl : s \ tᶜ = s ∩ t :=
sdiff_compl
#align set.diff_compl Set.diff_compl
theorem diff_diff_right {s t u : Set α} : s \ (t \ u) = s \ t ∪ s ∩ u :=
sdiff_sdiff_right'
#align set.diff_diff_right Set.diff_diff_right
@[simp]
theorem insert_diff_of_mem (s) (h : a ∈ t) : insert a s \ t = s \ t := by
ext
constructor <;> simp (config := { contextual := true }) [or_imp, h]
#align set.insert_diff_of_mem Set.insert_diff_of_mem
theorem insert_diff_of_not_mem (s) (h : a ∉ t) : insert a s \ t = insert a (s \ t) := by
classical
ext x
by_cases h' : x ∈ t
· have : x ≠ a := by
intro H
rw [H] at h'
exact h h'
simp [h, h', this]
· simp [h, h']
#align set.insert_diff_of_not_mem Set.insert_diff_of_not_mem
theorem insert_diff_self_of_not_mem {a : α} {s : Set α} (h : a ∉ s) : insert a s \ {a} = s := by
ext x
simp [and_iff_left_of_imp fun hx : x ∈ s => show x ≠ a from fun hxa => h <| hxa ▸ hx]
#align set.insert_diff_self_of_not_mem Set.insert_diff_self_of_not_mem
@[simp]
theorem insert_diff_eq_singleton {a : α} {s : Set α} (h : a ∉ s) : insert a s \ s = {a} := by
ext
rw [Set.mem_diff, Set.mem_insert_iff, Set.mem_singleton_iff, or_and_right, and_not_self_iff,
or_false_iff, and_iff_left_iff_imp]
rintro rfl
exact h
#align set.insert_diff_eq_singleton Set.insert_diff_eq_singleton
| Mathlib/Data/Set/Basic.lean | 1,972 | 1,973 | theorem inter_insert_of_mem (h : a ∈ s) : s ∩ insert a t = insert a (s ∩ t) := by |
rw [insert_inter_distrib, insert_eq_of_mem h]
|
import Mathlib.Algebra.Associated
import Mathlib.Algebra.BigOperators.Group.Finset
import Mathlib.Algebra.SMulWithZero
import Mathlib.Data.Nat.PartENat
import Mathlib.Tactic.Linarith
#align_import ring_theory.multiplicity from "leanprover-community/mathlib"@"e8638a0fcaf73e4500469f368ef9494e495099b3"
variable {α β : Type*}
open Nat Part
def multiplicity [Monoid α] [DecidableRel ((· ∣ ·) : α → α → Prop)] (a b : α) : PartENat :=
PartENat.find fun n => ¬a ^ (n + 1) ∣ b
#align multiplicity multiplicity
namespace multiplicity
section Monoid
variable [Monoid α] [Monoid β]
abbrev Finite (a b : α) : Prop :=
∃ n : ℕ, ¬a ^ (n + 1) ∣ b
#align multiplicity.finite multiplicity.Finite
theorem finite_iff_dom [DecidableRel ((· ∣ ·) : α → α → Prop)] {a b : α} :
Finite a b ↔ (multiplicity a b).Dom :=
Iff.rfl
#align multiplicity.finite_iff_dom multiplicity.finite_iff_dom
theorem finite_def {a b : α} : Finite a b ↔ ∃ n : ℕ, ¬a ^ (n + 1) ∣ b :=
Iff.rfl
#align multiplicity.finite_def multiplicity.finite_def
theorem not_dvd_one_of_finite_one_right {a : α} : Finite a 1 → ¬a ∣ 1 := fun ⟨n, hn⟩ ⟨d, hd⟩ =>
hn ⟨d ^ (n + 1), (pow_mul_pow_eq_one (n + 1) hd.symm).symm⟩
#align multiplicity.not_dvd_one_of_finite_one_right multiplicity.not_dvd_one_of_finite_one_right
@[norm_cast]
theorem Int.natCast_multiplicity (a b : ℕ) : multiplicity (a : ℤ) (b : ℤ) = multiplicity a b := by
apply Part.ext'
· rw [← @finite_iff_dom ℕ, @finite_def ℕ, ← @finite_iff_dom ℤ, @finite_def ℤ]
norm_cast
· intro h1 h2
apply _root_.le_antisymm <;>
· apply Nat.find_mono
norm_cast
simp
#align multiplicity.int.coe_nat_multiplicity multiplicity.Int.natCast_multiplicity
@[deprecated (since := "2024-04-05")] alias Int.coe_nat_multiplicity := Int.natCast_multiplicity
theorem not_finite_iff_forall {a b : α} : ¬Finite a b ↔ ∀ n : ℕ, a ^ n ∣ b :=
⟨fun h n =>
Nat.casesOn n
(by
rw [_root_.pow_zero]
exact one_dvd _)
(by simpa [Finite, Classical.not_not] using h),
by simp [Finite, multiplicity, Classical.not_not]; tauto⟩
#align multiplicity.not_finite_iff_forall multiplicity.not_finite_iff_forall
theorem not_unit_of_finite {a b : α} (h : Finite a b) : ¬IsUnit a :=
let ⟨n, hn⟩ := h
hn ∘ IsUnit.dvd ∘ IsUnit.pow (n + 1)
#align multiplicity.not_unit_of_finite multiplicity.not_unit_of_finite
theorem finite_of_finite_mul_right {a b c : α} : Finite a (b * c) → Finite a b := fun ⟨n, hn⟩ =>
⟨n, fun h => hn (h.trans (dvd_mul_right _ _))⟩
#align multiplicity.finite_of_finite_mul_right multiplicity.finite_of_finite_mul_right
variable [DecidableRel ((· ∣ ·) : α → α → Prop)] [DecidableRel ((· ∣ ·) : β → β → Prop)]
theorem pow_dvd_of_le_multiplicity {a b : α} {k : ℕ} :
(k : PartENat) ≤ multiplicity a b → a ^ k ∣ b := by
rw [← PartENat.some_eq_natCast]
exact
Nat.casesOn k
(fun _ => by
rw [_root_.pow_zero]
exact one_dvd _)
fun k ⟨_, h₂⟩ => by_contradiction fun hk => Nat.find_min _ (lt_of_succ_le (h₂ ⟨k, hk⟩)) hk
#align multiplicity.pow_dvd_of_le_multiplicity multiplicity.pow_dvd_of_le_multiplicity
theorem pow_multiplicity_dvd {a b : α} (h : Finite a b) : a ^ get (multiplicity a b) h ∣ b :=
pow_dvd_of_le_multiplicity (by rw [PartENat.natCast_get])
#align multiplicity.pow_multiplicity_dvd multiplicity.pow_multiplicity_dvd
theorem is_greatest {a b : α} {m : ℕ} (hm : multiplicity a b < m) : ¬a ^ m ∣ b := fun h => by
rw [PartENat.lt_coe_iff] at hm; exact Nat.find_spec hm.fst ((pow_dvd_pow _ hm.snd).trans h)
#align multiplicity.is_greatest multiplicity.is_greatest
theorem is_greatest' {a b : α} {m : ℕ} (h : Finite a b) (hm : get (multiplicity a b) h < m) :
¬a ^ m ∣ b :=
is_greatest (by rwa [← PartENat.coe_lt_coe, PartENat.natCast_get] at hm)
#align multiplicity.is_greatest' multiplicity.is_greatest'
theorem pos_of_dvd {a b : α} (hfin : Finite a b) (hdiv : a ∣ b) :
0 < (multiplicity a b).get hfin := by
refine zero_lt_iff.2 fun h => ?_
simpa [hdiv] using is_greatest' hfin (lt_one_iff.mpr h)
#align multiplicity.pos_of_dvd multiplicity.pos_of_dvd
theorem unique {a b : α} {k : ℕ} (hk : a ^ k ∣ b) (hsucc : ¬a ^ (k + 1) ∣ b) :
(k : PartENat) = multiplicity a b :=
le_antisymm (le_of_not_gt fun hk' => is_greatest hk' hk) <| by
have : Finite a b := ⟨k, hsucc⟩
rw [PartENat.le_coe_iff]
exact ⟨this, Nat.find_min' _ hsucc⟩
#align multiplicity.unique multiplicity.unique
theorem unique' {a b : α} {k : ℕ} (hk : a ^ k ∣ b) (hsucc : ¬a ^ (k + 1) ∣ b) :
k = get (multiplicity a b) ⟨k, hsucc⟩ := by
rw [← PartENat.natCast_inj, PartENat.natCast_get, unique hk hsucc]
#align multiplicity.unique' multiplicity.unique'
theorem le_multiplicity_of_pow_dvd {a b : α} {k : ℕ} (hk : a ^ k ∣ b) :
(k : PartENat) ≤ multiplicity a b :=
le_of_not_gt fun hk' => is_greatest hk' hk
#align multiplicity.le_multiplicity_of_pow_dvd multiplicity.le_multiplicity_of_pow_dvd
theorem pow_dvd_iff_le_multiplicity {a b : α} {k : ℕ} :
a ^ k ∣ b ↔ (k : PartENat) ≤ multiplicity a b :=
⟨le_multiplicity_of_pow_dvd, pow_dvd_of_le_multiplicity⟩
#align multiplicity.pow_dvd_iff_le_multiplicity multiplicity.pow_dvd_iff_le_multiplicity
theorem multiplicity_lt_iff_not_dvd {a b : α} {k : ℕ} :
multiplicity a b < (k : PartENat) ↔ ¬a ^ k ∣ b := by rw [pow_dvd_iff_le_multiplicity, not_le]
#align multiplicity.multiplicity_lt_iff_neg_dvd multiplicity.multiplicity_lt_iff_not_dvd
theorem eq_coe_iff {a b : α} {n : ℕ} :
multiplicity a b = (n : PartENat) ↔ a ^ n ∣ b ∧ ¬a ^ (n + 1) ∣ b := by
rw [← PartENat.some_eq_natCast]
exact
⟨fun h =>
let ⟨h₁, h₂⟩ := eq_some_iff.1 h
h₂ ▸ ⟨pow_multiplicity_dvd _, is_greatest (by
rw [PartENat.lt_coe_iff]
exact ⟨h₁, lt_succ_self _⟩)⟩,
fun h => eq_some_iff.2 ⟨⟨n, h.2⟩, Eq.symm <| unique' h.1 h.2⟩⟩
#align multiplicity.eq_coe_iff multiplicity.eq_coe_iff
theorem eq_top_iff {a b : α} : multiplicity a b = ⊤ ↔ ∀ n : ℕ, a ^ n ∣ b :=
(PartENat.find_eq_top_iff _).trans <| by
simp only [Classical.not_not]
exact
⟨fun h n =>
Nat.casesOn n
(by
rw [_root_.pow_zero]
exact one_dvd _)
fun n => h _,
fun h n => h _⟩
#align multiplicity.eq_top_iff multiplicity.eq_top_iff
@[simp]
theorem isUnit_left {a : α} (b : α) (ha : IsUnit a) : multiplicity a b = ⊤ :=
eq_top_iff.2 fun _ => IsUnit.dvd (ha.pow _)
#align multiplicity.is_unit_left multiplicity.isUnit_left
-- @[simp] Porting note (#10618): simp can prove this
theorem one_left (b : α) : multiplicity 1 b = ⊤ :=
isUnit_left b isUnit_one
#align multiplicity.one_left multiplicity.one_left
@[simp]
theorem get_one_right {a : α} (ha : Finite a 1) : get (multiplicity a 1) ha = 0 := by
rw [PartENat.get_eq_iff_eq_coe, eq_coe_iff, _root_.pow_zero]
simp [not_dvd_one_of_finite_one_right ha]
#align multiplicity.get_one_right multiplicity.get_one_right
-- @[simp] Porting note (#10618): simp can prove this
theorem unit_left (a : α) (u : αˣ) : multiplicity (u : α) a = ⊤ :=
isUnit_left a u.isUnit
#align multiplicity.unit_left multiplicity.unit_left
theorem multiplicity_eq_zero {a b : α} : multiplicity a b = 0 ↔ ¬a ∣ b := by
rw [← Nat.cast_zero, eq_coe_iff]
simp only [_root_.pow_zero, isUnit_one, IsUnit.dvd, zero_add, pow_one, true_and]
#align multiplicity.multiplicity_eq_zero multiplicity.multiplicity_eq_zero
theorem multiplicity_ne_zero {a b : α} : multiplicity a b ≠ 0 ↔ a ∣ b :=
multiplicity_eq_zero.not_left
#align multiplicity.multiplicity_ne_zero multiplicity.multiplicity_ne_zero
theorem eq_top_iff_not_finite {a b : α} : multiplicity a b = ⊤ ↔ ¬Finite a b :=
Part.eq_none_iff'
#align multiplicity.eq_top_iff_not_finite multiplicity.eq_top_iff_not_finite
theorem ne_top_iff_finite {a b : α} : multiplicity a b ≠ ⊤ ↔ Finite a b := by
rw [Ne, eq_top_iff_not_finite, Classical.not_not]
#align multiplicity.ne_top_iff_finite multiplicity.ne_top_iff_finite
theorem lt_top_iff_finite {a b : α} : multiplicity a b < ⊤ ↔ Finite a b := by
rw [lt_top_iff_ne_top, ne_top_iff_finite]
#align multiplicity.lt_top_iff_finite multiplicity.lt_top_iff_finite
theorem exists_eq_pow_mul_and_not_dvd {a b : α} (hfin : Finite a b) :
∃ c : α, b = a ^ (multiplicity a b).get hfin * c ∧ ¬a ∣ c := by
obtain ⟨c, hc⟩ := multiplicity.pow_multiplicity_dvd hfin
refine ⟨c, hc, ?_⟩
rintro ⟨k, hk⟩
rw [hk, ← mul_assoc, ← _root_.pow_succ] at hc
have h₁ : a ^ ((multiplicity a b).get hfin + 1) ∣ b := ⟨k, hc⟩
exact (multiplicity.eq_coe_iff.1 (by simp)).2 h₁
#align multiplicity.exists_eq_pow_mul_and_not_dvd multiplicity.exists_eq_pow_mul_and_not_dvd
theorem multiplicity_le_multiplicity_iff {a b : α} {c d : β} :
multiplicity a b ≤ multiplicity c d ↔ ∀ n : ℕ, a ^ n ∣ b → c ^ n ∣ d :=
⟨fun h n hab => pow_dvd_of_le_multiplicity (le_trans (le_multiplicity_of_pow_dvd hab) h), fun h =>
letI := Classical.dec (Finite a b)
if hab : Finite a b then by
rw [← PartENat.natCast_get (finite_iff_dom.1 hab)];
exact le_multiplicity_of_pow_dvd (h _ (pow_multiplicity_dvd _))
else by
have : ∀ n : ℕ, c ^ n ∣ d := fun n => h n (not_finite_iff_forall.1 hab _)
rw [eq_top_iff_not_finite.2 hab, eq_top_iff_not_finite.2 (not_finite_iff_forall.2 this)]⟩
#align multiplicity.multiplicity_le_multiplicity_iff multiplicity.multiplicity_le_multiplicity_iff
theorem multiplicity_eq_multiplicity_iff {a b : α} {c d : β} :
multiplicity a b = multiplicity c d ↔ ∀ n : ℕ, a ^ n ∣ b ↔ c ^ n ∣ d :=
⟨fun h n =>
⟨multiplicity_le_multiplicity_iff.mp h.le n, multiplicity_le_multiplicity_iff.mp h.ge n⟩,
fun h =>
le_antisymm (multiplicity_le_multiplicity_iff.mpr fun n => (h n).mp)
(multiplicity_le_multiplicity_iff.mpr fun n => (h n).mpr)⟩
#align multiplicity.multiplicity_eq_multiplicity_iff multiplicity.multiplicity_eq_multiplicity_iff
theorem le_multiplicity_map {F : Type*} [FunLike F α β] [MonoidHomClass F α β]
(f : F) {a b : α} : multiplicity a b ≤ multiplicity (f a) (f b) :=
multiplicity_le_multiplicity_iff.mpr fun n ↦ by rw [← map_pow]; exact map_dvd f
theorem multiplicity_map_eq {F : Type*} [EquivLike F α β] [MulEquivClass F α β]
(f : F) {a b : α} : multiplicity (f a) (f b) = multiplicity a b :=
multiplicity_eq_multiplicity_iff.mpr fun n ↦ by rw [← map_pow]; exact map_dvd_iff f
theorem multiplicity_le_multiplicity_of_dvd_right {a b c : α} (h : b ∣ c) :
multiplicity a b ≤ multiplicity a c :=
multiplicity_le_multiplicity_iff.2 fun _ hb => hb.trans h
#align multiplicity.multiplicity_le_multiplicity_of_dvd_right multiplicity.multiplicity_le_multiplicity_of_dvd_right
theorem eq_of_associated_right {a b c : α} (h : Associated b c) :
multiplicity a b = multiplicity a c :=
le_antisymm (multiplicity_le_multiplicity_of_dvd_right h.dvd)
(multiplicity_le_multiplicity_of_dvd_right h.symm.dvd)
#align multiplicity.eq_of_associated_right multiplicity.eq_of_associated_right
| Mathlib/RingTheory/Multiplicity.lean | 273 | 276 | theorem dvd_of_multiplicity_pos {a b : α} (h : (0 : PartENat) < multiplicity a b) : a ∣ b := by |
rw [← pow_one a]
apply pow_dvd_of_le_multiplicity
simpa only [Nat.cast_one, PartENat.pos_iff_one_le] using h
|
import Mathlib.Algebra.MvPolynomial.Degrees
#align_import data.mv_polynomial.variables from "leanprover-community/mathlib"@"2f5b500a507264de86d666a5f87ddb976e2d8de4"
noncomputable section
open Set Function Finsupp AddMonoidAlgebra
universe u v w
variable {R : Type u} {S : Type v}
namespace MvPolynomial
variable {σ τ : Type*} {r : R} {e : ℕ} {n m : σ} {s : σ →₀ ℕ}
section CommSemiring
variable [CommSemiring R] {p q : MvPolynomial σ R}
section Vars
def vars (p : MvPolynomial σ R) : Finset σ :=
letI := Classical.decEq σ
p.degrees.toFinset
#align mv_polynomial.vars MvPolynomial.vars
theorem vars_def [DecidableEq σ] (p : MvPolynomial σ R) : p.vars = p.degrees.toFinset := by
rw [vars]
convert rfl
#align mv_polynomial.vars_def MvPolynomial.vars_def
@[simp]
theorem vars_0 : (0 : MvPolynomial σ R).vars = ∅ := by
classical rw [vars_def, degrees_zero, Multiset.toFinset_zero]
#align mv_polynomial.vars_0 MvPolynomial.vars_0
@[simp]
theorem vars_monomial (h : r ≠ 0) : (monomial s r).vars = s.support := by
classical rw [vars_def, degrees_monomial_eq _ _ h, Finsupp.toFinset_toMultiset]
#align mv_polynomial.vars_monomial MvPolynomial.vars_monomial
@[simp]
theorem vars_C : (C r : MvPolynomial σ R).vars = ∅ := by
classical rw [vars_def, degrees_C, Multiset.toFinset_zero]
set_option linter.uppercaseLean3 false in
#align mv_polynomial.vars_C MvPolynomial.vars_C
@[simp]
theorem vars_X [Nontrivial R] : (X n : MvPolynomial σ R).vars = {n} := by
rw [X, vars_monomial (one_ne_zero' R), Finsupp.support_single_ne_zero _ (one_ne_zero' ℕ)]
set_option linter.uppercaseLean3 false in
#align mv_polynomial.vars_X MvPolynomial.vars_X
| Mathlib/Algebra/MvPolynomial/Variables.lean | 98 | 99 | theorem mem_vars (i : σ) : i ∈ p.vars ↔ ∃ d ∈ p.support, i ∈ d.support := by |
classical simp only [vars_def, Multiset.mem_toFinset, mem_degrees, mem_support_iff, exists_prop]
|
import Mathlib.Data.Set.Function
import Mathlib.Logic.Equiv.Defs
import Mathlib.Tactic.Core
import Mathlib.Tactic.Attr.Core
#align_import logic.equiv.local_equiv from "leanprover-community/mathlib"@"48fb5b5280e7c81672afc9524185ae994553ebf4"
open Lean Meta Elab Tactic
def mfld_cfg : Simps.Config where
attrs := [`mfld_simps]
fullyApplied := false
#align mfld_cfg mfld_cfg
open Function Set
variable {α : Type*} {β : Type*} {γ : Type*} {δ : Type*}
structure PartialEquiv (α : Type*) (β : Type*) where
toFun : α → β
invFun : β → α
source : Set α
target : Set β
map_source' : ∀ ⦃x⦄, x ∈ source → toFun x ∈ target
map_target' : ∀ ⦃x⦄, x ∈ target → invFun x ∈ source
left_inv' : ∀ ⦃x⦄, x ∈ source → invFun (toFun x) = x
right_inv' : ∀ ⦃x⦄, x ∈ target → toFun (invFun x) = x
#align local_equiv PartialEquiv
attribute [coe] PartialEquiv.toFun
namespace PartialEquiv
variable (e : PartialEquiv α β) (e' : PartialEquiv β γ)
instance [Inhabited α] [Inhabited β] : Inhabited (PartialEquiv α β) :=
⟨⟨const α default, const β default, ∅, ∅, mapsTo_empty _ _, mapsTo_empty _ _, eqOn_empty _ _,
eqOn_empty _ _⟩⟩
@[symm]
protected def symm : PartialEquiv β α where
toFun := e.invFun
invFun := e.toFun
source := e.target
target := e.source
map_source' := e.map_target'
map_target' := e.map_source'
left_inv' := e.right_inv'
right_inv' := e.left_inv'
#align local_equiv.symm PartialEquiv.symm
instance : CoeFun (PartialEquiv α β) fun _ => α → β :=
⟨PartialEquiv.toFun⟩
def Simps.symm_apply (e : PartialEquiv α β) : β → α :=
e.symm
#align local_equiv.simps.symm_apply PartialEquiv.Simps.symm_apply
initialize_simps_projections PartialEquiv (toFun → apply, invFun → symm_apply)
-- Porting note: this can be proven with `dsimp only`
-- @[simp, mfld_simps]
-- theorem coe_mk (f : α → β) (g s t ml mr il ir) :
-- (PartialEquiv.mk f g s t ml mr il ir : α → β) = f := by dsimp only
-- #align local_equiv.coe_mk PartialEquiv.coe_mk
#noalign local_equiv.coe_mk
@[simp, mfld_simps]
theorem coe_symm_mk (f : α → β) (g s t ml mr il ir) :
((PartialEquiv.mk f g s t ml mr il ir).symm : β → α) = g :=
rfl
#align local_equiv.coe_symm_mk PartialEquiv.coe_symm_mk
-- Porting note: this is now a syntactic tautology
-- @[simp, mfld_simps]
-- theorem toFun_as_coe : e.toFun = e := rfl
-- #align local_equiv.to_fun_as_coe PartialEquiv.toFun_as_coe
#noalign local_equiv.to_fun_as_coe
@[simp, mfld_simps]
theorem invFun_as_coe : e.invFun = e.symm :=
rfl
#align local_equiv.inv_fun_as_coe PartialEquiv.invFun_as_coe
@[simp, mfld_simps]
theorem map_source {x : α} (h : x ∈ e.source) : e x ∈ e.target :=
e.map_source' h
#align local_equiv.map_source PartialEquiv.map_source
lemma map_source'' : e '' e.source ⊆ e.target :=
fun _ ⟨_, hx, hex⟩ ↦ mem_of_eq_of_mem (id hex.symm) (e.map_source' hx)
@[simp, mfld_simps]
theorem map_target {x : β} (h : x ∈ e.target) : e.symm x ∈ e.source :=
e.map_target' h
#align local_equiv.map_target PartialEquiv.map_target
@[simp, mfld_simps]
theorem left_inv {x : α} (h : x ∈ e.source) : e.symm (e x) = x :=
e.left_inv' h
#align local_equiv.left_inv PartialEquiv.left_inv
@[simp, mfld_simps]
theorem right_inv {x : β} (h : x ∈ e.target) : e (e.symm x) = x :=
e.right_inv' h
#align local_equiv.right_inv PartialEquiv.right_inv
theorem eq_symm_apply {x : α} {y : β} (hx : x ∈ e.source) (hy : y ∈ e.target) :
x = e.symm y ↔ e x = y :=
⟨fun h => by rw [← e.right_inv hy, h], fun h => by rw [← e.left_inv hx, h]⟩
#align local_equiv.eq_symm_apply PartialEquiv.eq_symm_apply
protected theorem mapsTo : MapsTo e e.source e.target := fun _ => e.map_source
#align local_equiv.maps_to PartialEquiv.mapsTo
theorem symm_mapsTo : MapsTo e.symm e.target e.source :=
e.symm.mapsTo
#align local_equiv.symm_maps_to PartialEquiv.symm_mapsTo
protected theorem leftInvOn : LeftInvOn e.symm e e.source := fun _ => e.left_inv
#align local_equiv.left_inv_on PartialEquiv.leftInvOn
protected theorem rightInvOn : RightInvOn e.symm e e.target := fun _ => e.right_inv
#align local_equiv.right_inv_on PartialEquiv.rightInvOn
protected theorem invOn : InvOn e.symm e e.source e.target :=
⟨e.leftInvOn, e.rightInvOn⟩
#align local_equiv.inv_on PartialEquiv.invOn
protected theorem injOn : InjOn e e.source :=
e.leftInvOn.injOn
#align local_equiv.inj_on PartialEquiv.injOn
protected theorem bijOn : BijOn e e.source e.target :=
e.invOn.bijOn e.mapsTo e.symm_mapsTo
#align local_equiv.bij_on PartialEquiv.bijOn
protected theorem surjOn : SurjOn e e.source e.target :=
e.bijOn.surjOn
#align local_equiv.surj_on PartialEquiv.surjOn
@[simps (config := .asFn)]
def _root_.Equiv.toPartialEquivOfImageEq (e : α ≃ β) (s : Set α) (t : Set β) (h : e '' s = t) :
PartialEquiv α β where
toFun := e
invFun := e.symm
source := s
target := t
map_source' x hx := h ▸ mem_image_of_mem _ hx
map_target' x hx := by
subst t
rcases hx with ⟨x, hx, rfl⟩
rwa [e.symm_apply_apply]
left_inv' x _ := e.symm_apply_apply x
right_inv' x _ := e.apply_symm_apply x
@[simps! (config := mfld_cfg)]
def _root_.Equiv.toPartialEquiv (e : α ≃ β) : PartialEquiv α β :=
e.toPartialEquivOfImageEq univ univ <| by rw [image_univ, e.surjective.range_eq]
#align equiv.to_local_equiv Equiv.toPartialEquiv
#align equiv.to_local_equiv_symm_apply Equiv.toPartialEquiv_symm_apply
#align equiv.to_local_equiv_target Equiv.toPartialEquiv_target
#align equiv.to_local_equiv_apply Equiv.toPartialEquiv_apply
#align equiv.to_local_equiv_source Equiv.toPartialEquiv_source
instance inhabitedOfEmpty [IsEmpty α] [IsEmpty β] : Inhabited (PartialEquiv α β) :=
⟨((Equiv.equivEmpty α).trans (Equiv.equivEmpty β).symm).toPartialEquiv⟩
#align local_equiv.inhabited_of_empty PartialEquiv.inhabitedOfEmpty
@[simps (config := .asFn)]
def copy (e : PartialEquiv α β) (f : α → β) (hf : ⇑e = f) (g : β → α) (hg : ⇑e.symm = g) (s : Set α)
(hs : e.source = s) (t : Set β) (ht : e.target = t) :
PartialEquiv α β where
toFun := f
invFun := g
source := s
target := t
map_source' _ := ht ▸ hs ▸ hf ▸ e.map_source
map_target' _ := hs ▸ ht ▸ hg ▸ e.map_target
left_inv' _ := hs ▸ hf ▸ hg ▸ e.left_inv
right_inv' _ := ht ▸ hf ▸ hg ▸ e.right_inv
#align local_equiv.copy PartialEquiv.copy
#align local_equiv.copy_source PartialEquiv.copy_source
#align local_equiv.copy_apply PartialEquiv.copy_apply
#align local_equiv.copy_symm_apply PartialEquiv.copy_symm_apply
#align local_equiv.copy_target PartialEquiv.copy_target
theorem copy_eq (e : PartialEquiv α β) (f : α → β) (hf : ⇑e = f) (g : β → α) (hg : ⇑e.symm = g)
(s : Set α) (hs : e.source = s) (t : Set β) (ht : e.target = t) :
e.copy f hf g hg s hs t ht = e := by
substs f g s t
cases e
rfl
#align local_equiv.copy_eq PartialEquiv.copy_eq
protected def toEquiv : e.source ≃ e.target where
toFun x := ⟨e x, e.map_source x.mem⟩
invFun y := ⟨e.symm y, e.map_target y.mem⟩
left_inv := fun ⟨_, hx⟩ => Subtype.eq <| e.left_inv hx
right_inv := fun ⟨_, hy⟩ => Subtype.eq <| e.right_inv hy
#align local_equiv.to_equiv PartialEquiv.toEquiv
@[simp, mfld_simps]
theorem symm_source : e.symm.source = e.target :=
rfl
#align local_equiv.symm_source PartialEquiv.symm_source
@[simp, mfld_simps]
theorem symm_target : e.symm.target = e.source :=
rfl
#align local_equiv.symm_target PartialEquiv.symm_target
@[simp, mfld_simps]
| Mathlib/Logic/Equiv/PartialEquiv.lean | 332 | 334 | theorem symm_symm : e.symm.symm = e := by |
cases e
rfl
|
import Mathlib.Algebra.BigOperators.Fin
import Mathlib.Algebra.GeomSum
import Mathlib.LinearAlgebra.Matrix.Block
import Mathlib.LinearAlgebra.Matrix.Determinant.Basic
import Mathlib.LinearAlgebra.Matrix.Nondegenerate
#align_import linear_algebra.vandermonde from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a"
variable {R : Type*} [CommRing R]
open Equiv Finset
open Matrix
namespace Matrix
def vandermonde {n : ℕ} (v : Fin n → R) : Matrix (Fin n) (Fin n) R := fun i j => v i ^ (j : ℕ)
#align matrix.vandermonde Matrix.vandermonde
@[simp]
theorem vandermonde_apply {n : ℕ} (v : Fin n → R) (i j) : vandermonde v i j = v i ^ (j : ℕ) :=
rfl
#align matrix.vandermonde_apply Matrix.vandermonde_apply
@[simp]
theorem vandermonde_cons {n : ℕ} (v0 : R) (v : Fin n → R) :
vandermonde (Fin.cons v0 v : Fin n.succ → R) =
Fin.cons (fun (j : Fin n.succ) => v0 ^ (j : ℕ)) fun i => Fin.cons 1
fun j => v i * vandermonde v i j := by
ext i j
refine Fin.cases (by simp) (fun i => ?_) i
refine Fin.cases (by simp) (fun j => ?_) j
simp [pow_succ']
#align matrix.vandermonde_cons Matrix.vandermonde_cons
theorem vandermonde_succ {n : ℕ} (v : Fin n.succ → R) :
vandermonde v =
Fin.cons (fun (j : Fin n.succ) => v 0 ^ (j : ℕ)) fun i =>
Fin.cons 1 fun j => v i.succ * vandermonde (Fin.tail v) i j := by
conv_lhs => rw [← Fin.cons_self_tail v, vandermonde_cons]
rfl
#align matrix.vandermonde_succ Matrix.vandermonde_succ
theorem vandermonde_mul_vandermonde_transpose {n : ℕ} (v w : Fin n → R) (i j) :
(vandermonde v * (vandermonde w)ᵀ) i j = ∑ k : Fin n, (v i * w j) ^ (k : ℕ) := by
simp only [vandermonde_apply, Matrix.mul_apply, Matrix.transpose_apply, mul_pow]
#align matrix.vandermonde_mul_vandermonde_transpose Matrix.vandermonde_mul_vandermonde_transpose
| Mathlib/LinearAlgebra/Vandermonde.lean | 72 | 74 | theorem vandermonde_transpose_mul_vandermonde {n : ℕ} (v : Fin n → R) (i j) :
((vandermonde v)ᵀ * vandermonde v) i j = ∑ k : Fin n, v k ^ (i + j : ℕ) := by |
simp only [vandermonde_apply, Matrix.mul_apply, Matrix.transpose_apply, pow_add]
|
import Mathlib.Algebra.MvPolynomial.Basic
import Mathlib.Data.Finset.PiAntidiagonal
import Mathlib.LinearAlgebra.StdBasis
import Mathlib.Tactic.Linarith
#align_import ring_theory.power_series.basic from "leanprover-community/mathlib"@"2d5739b61641ee4e7e53eca5688a08f66f2e6a60"
noncomputable section
open Finset (antidiagonal mem_antidiagonal)
def MvPowerSeries (σ : Type*) (R : Type*) :=
(σ →₀ ℕ) → R
#align mv_power_series MvPowerSeries
namespace MvPowerSeries
open Finsupp
variable {σ R : Type*}
instance [Inhabited R] : Inhabited (MvPowerSeries σ R) :=
⟨fun _ => default⟩
instance [Zero R] : Zero (MvPowerSeries σ R) :=
Pi.instZero
instance [AddMonoid R] : AddMonoid (MvPowerSeries σ R) :=
Pi.addMonoid
instance [AddGroup R] : AddGroup (MvPowerSeries σ R) :=
Pi.addGroup
instance [AddCommMonoid R] : AddCommMonoid (MvPowerSeries σ R) :=
Pi.addCommMonoid
instance [AddCommGroup R] : AddCommGroup (MvPowerSeries σ R) :=
Pi.addCommGroup
instance [Nontrivial R] : Nontrivial (MvPowerSeries σ R) :=
Function.nontrivial
instance {A} [Semiring R] [AddCommMonoid A] [Module R A] : Module R (MvPowerSeries σ A) :=
Pi.module _ _ _
instance {A S} [Semiring R] [Semiring S] [AddCommMonoid A] [Module R A] [Module S A] [SMul R S]
[IsScalarTower R S A] : IsScalarTower R S (MvPowerSeries σ A) :=
Pi.isScalarTower
section Semiring
variable (R) [Semiring R]
def monomial (n : σ →₀ ℕ) : R →ₗ[R] MvPowerSeries σ R :=
letI := Classical.decEq σ
LinearMap.stdBasis R (fun _ ↦ R) n
#align mv_power_series.monomial MvPowerSeries.monomial
def coeff (n : σ →₀ ℕ) : MvPowerSeries σ R →ₗ[R] R :=
LinearMap.proj n
#align mv_power_series.coeff MvPowerSeries.coeff
variable {R}
@[ext]
theorem ext {φ ψ} (h : ∀ n : σ →₀ ℕ, coeff R n φ = coeff R n ψ) : φ = ψ :=
funext h
#align mv_power_series.ext MvPowerSeries.ext
theorem ext_iff {φ ψ : MvPowerSeries σ R} : φ = ψ ↔ ∀ n : σ →₀ ℕ, coeff R n φ = coeff R n ψ :=
Function.funext_iff
#align mv_power_series.ext_iff MvPowerSeries.ext_iff
theorem monomial_def [DecidableEq σ] (n : σ →₀ ℕ) :
(monomial R n) = LinearMap.stdBasis R (fun _ ↦ R) n := by
rw [monomial]
-- unify the `Decidable` arguments
convert rfl
#align mv_power_series.monomial_def MvPowerSeries.monomial_def
theorem coeff_monomial [DecidableEq σ] (m n : σ →₀ ℕ) (a : R) :
coeff R m (monomial R n a) = if m = n then a else 0 := by
-- This used to be `rw`, but we need `erw` after leanprover/lean4#2644
erw [coeff, monomial_def, LinearMap.proj_apply (i := m)]
dsimp only
-- This used to be `rw`, but we need `erw` after leanprover/lean4#2644
erw [LinearMap.stdBasis_apply, Function.update_apply, Pi.zero_apply]
#align mv_power_series.coeff_monomial MvPowerSeries.coeff_monomial
@[simp]
theorem coeff_monomial_same (n : σ →₀ ℕ) (a : R) : coeff R n (monomial R n a) = a := by
classical
rw [monomial_def]
exact LinearMap.stdBasis_same R (fun _ ↦ R) n a
#align mv_power_series.coeff_monomial_same MvPowerSeries.coeff_monomial_same
theorem coeff_monomial_ne {m n : σ →₀ ℕ} (h : m ≠ n) (a : R) : coeff R m (monomial R n a) = 0 := by
classical
rw [monomial_def]
exact LinearMap.stdBasis_ne R (fun _ ↦ R) _ _ h a
#align mv_power_series.coeff_monomial_ne MvPowerSeries.coeff_monomial_ne
theorem eq_of_coeff_monomial_ne_zero {m n : σ →₀ ℕ} {a : R} (h : coeff R m (monomial R n a) ≠ 0) :
m = n :=
by_contra fun h' => h <| coeff_monomial_ne h' a
#align mv_power_series.eq_of_coeff_monomial_ne_zero MvPowerSeries.eq_of_coeff_monomial_ne_zero
@[simp]
theorem coeff_comp_monomial (n : σ →₀ ℕ) : (coeff R n).comp (monomial R n) = LinearMap.id :=
LinearMap.ext <| coeff_monomial_same n
#align mv_power_series.coeff_comp_monomial MvPowerSeries.coeff_comp_monomial
-- Porting note (#10618): simp can prove this.
-- @[simp]
theorem coeff_zero (n : σ →₀ ℕ) : coeff R n (0 : MvPowerSeries σ R) = 0 :=
rfl
#align mv_power_series.coeff_zero MvPowerSeries.coeff_zero
variable (m n : σ →₀ ℕ) (φ ψ : MvPowerSeries σ R)
instance : One (MvPowerSeries σ R) :=
⟨monomial R (0 : σ →₀ ℕ) 1⟩
theorem coeff_one [DecidableEq σ] : coeff R n (1 : MvPowerSeries σ R) = if n = 0 then 1 else 0 :=
coeff_monomial _ _ _
#align mv_power_series.coeff_one MvPowerSeries.coeff_one
theorem coeff_zero_one : coeff R (0 : σ →₀ ℕ) 1 = 1 :=
coeff_monomial_same 0 1
#align mv_power_series.coeff_zero_one MvPowerSeries.coeff_zero_one
theorem monomial_zero_one : monomial R (0 : σ →₀ ℕ) 1 = 1 :=
rfl
#align mv_power_series.monomial_zero_one MvPowerSeries.monomial_zero_one
instance : AddMonoidWithOne (MvPowerSeries σ R) :=
{ show AddMonoid (MvPowerSeries σ R) by infer_instance with
natCast := fun n => monomial R 0 n
natCast_zero := by simp [Nat.cast]
natCast_succ := by simp [Nat.cast, monomial_zero_one]
one := 1 }
instance : Mul (MvPowerSeries σ R) :=
letI := Classical.decEq σ
⟨fun φ ψ n => ∑ p ∈ antidiagonal n, coeff R p.1 φ * coeff R p.2 ψ⟩
theorem coeff_mul [DecidableEq σ] :
coeff R n (φ * ψ) = ∑ p ∈ antidiagonal n, coeff R p.1 φ * coeff R p.2 ψ := by
refine Finset.sum_congr ?_ fun _ _ => rfl
rw [Subsingleton.elim (Classical.decEq σ) ‹DecidableEq σ›]
#align mv_power_series.coeff_mul MvPowerSeries.coeff_mul
protected theorem zero_mul : (0 : MvPowerSeries σ R) * φ = 0 :=
ext fun n => by classical simp [coeff_mul]
#align mv_power_series.zero_mul MvPowerSeries.zero_mul
protected theorem mul_zero : φ * 0 = 0 :=
ext fun n => by classical simp [coeff_mul]
#align mv_power_series.mul_zero MvPowerSeries.mul_zero
theorem coeff_monomial_mul (a : R) :
coeff R m (monomial R n a * φ) = if n ≤ m then a * coeff R (m - n) φ else 0 := by
classical
have :
∀ p ∈ antidiagonal m,
coeff R (p : (σ →₀ ℕ) × (σ →₀ ℕ)).1 (monomial R n a) * coeff R p.2 φ ≠ 0 → p.1 = n :=
fun p _ hp => eq_of_coeff_monomial_ne_zero (left_ne_zero_of_mul hp)
rw [coeff_mul, ← Finset.sum_filter_of_ne this, Finset.filter_fst_eq_antidiagonal _ n,
Finset.sum_ite_index]
simp only [Finset.sum_singleton, coeff_monomial_same, Finset.sum_empty]
#align mv_power_series.coeff_monomial_mul MvPowerSeries.coeff_monomial_mul
theorem coeff_mul_monomial (a : R) :
coeff R m (φ * monomial R n a) = if n ≤ m then coeff R (m - n) φ * a else 0 := by
classical
have :
∀ p ∈ antidiagonal m,
coeff R (p : (σ →₀ ℕ) × (σ →₀ ℕ)).1 φ * coeff R p.2 (monomial R n a) ≠ 0 → p.2 = n :=
fun p _ hp => eq_of_coeff_monomial_ne_zero (right_ne_zero_of_mul hp)
rw [coeff_mul, ← Finset.sum_filter_of_ne this, Finset.filter_snd_eq_antidiagonal _ n,
Finset.sum_ite_index]
simp only [Finset.sum_singleton, coeff_monomial_same, Finset.sum_empty]
#align mv_power_series.coeff_mul_monomial MvPowerSeries.coeff_mul_monomial
| Mathlib/RingTheory/MvPowerSeries/Basic.lean | 238 | 241 | theorem coeff_add_monomial_mul (a : R) :
coeff R (m + n) (monomial R m a * φ) = a * coeff R n φ := by |
rw [coeff_monomial_mul, if_pos, add_tsub_cancel_left]
exact le_add_right le_rfl
|
import Mathlib.Algebra.BigOperators.Group.Finset
import Mathlib.Algebra.Group.Submonoid.Basic
import Mathlib.Deprecated.Group
#align_import deprecated.submonoid from "leanprover-community/mathlib"@"509de852e1de55e1efa8eacfa11df0823f26f226"
variable {M : Type*} [Monoid M] {s : Set M}
variable {A : Type*} [AddMonoid A] {t : Set A}
structure IsAddSubmonoid (s : Set A) : Prop where
zero_mem : (0 : A) ∈ s
add_mem {a b} : a ∈ s → b ∈ s → a + b ∈ s
#align is_add_submonoid IsAddSubmonoid
@[to_additive]
structure IsSubmonoid (s : Set M) : Prop where
one_mem : (1 : M) ∈ s
mul_mem {a b} : a ∈ s → b ∈ s → a * b ∈ s
#align is_submonoid IsSubmonoid
theorem Additive.isAddSubmonoid {s : Set M} :
IsSubmonoid s → @IsAddSubmonoid (Additive M) _ s
| ⟨h₁, h₂⟩ => ⟨h₁, @h₂⟩
#align additive.is_add_submonoid Additive.isAddSubmonoid
theorem Additive.isAddSubmonoid_iff {s : Set M} :
@IsAddSubmonoid (Additive M) _ s ↔ IsSubmonoid s :=
⟨fun ⟨h₁, h₂⟩ => ⟨h₁, @h₂⟩, Additive.isAddSubmonoid⟩
#align additive.is_add_submonoid_iff Additive.isAddSubmonoid_iff
theorem Multiplicative.isSubmonoid {s : Set A} :
IsAddSubmonoid s → @IsSubmonoid (Multiplicative A) _ s
| ⟨h₁, h₂⟩ => ⟨h₁, @h₂⟩
#align multiplicative.is_submonoid Multiplicative.isSubmonoid
theorem Multiplicative.isSubmonoid_iff {s : Set A} :
@IsSubmonoid (Multiplicative A) _ s ↔ IsAddSubmonoid s :=
⟨fun ⟨h₁, h₂⟩ => ⟨h₁, @h₂⟩, Multiplicative.isSubmonoid⟩
#align multiplicative.is_submonoid_iff Multiplicative.isSubmonoid_iff
@[to_additive
"The intersection of two `AddSubmonoid`s of an `AddMonoid` `M` is an `AddSubmonoid` of M."]
theorem IsSubmonoid.inter {s₁ s₂ : Set M} (is₁ : IsSubmonoid s₁) (is₂ : IsSubmonoid s₂) :
IsSubmonoid (s₁ ∩ s₂) :=
{ one_mem := ⟨is₁.one_mem, is₂.one_mem⟩
mul_mem := @fun _ _ hx hy => ⟨is₁.mul_mem hx.1 hy.1, is₂.mul_mem hx.2 hy.2⟩ }
#align is_submonoid.inter IsSubmonoid.inter
#align is_add_submonoid.inter IsAddSubmonoid.inter
@[to_additive
"The intersection of an indexed set of `AddSubmonoid`s of an `AddMonoid` `M` is
an `AddSubmonoid` of `M`."]
theorem IsSubmonoid.iInter {ι : Sort*} {s : ι → Set M} (h : ∀ y : ι, IsSubmonoid (s y)) :
IsSubmonoid (Set.iInter s) :=
{ one_mem := Set.mem_iInter.2 fun y => (h y).one_mem
mul_mem := fun h₁ h₂ =>
Set.mem_iInter.2 fun y => (h y).mul_mem (Set.mem_iInter.1 h₁ y) (Set.mem_iInter.1 h₂ y) }
#align is_submonoid.Inter IsSubmonoid.iInter
#align is_add_submonoid.Inter IsAddSubmonoid.iInter
@[to_additive
"The union of an indexed, directed, nonempty set of `AddSubmonoid`s of an `AddMonoid` `M`
is an `AddSubmonoid` of `M`. "]
theorem isSubmonoid_iUnion_of_directed {ι : Type*} [hι : Nonempty ι] {s : ι → Set M}
(hs : ∀ i, IsSubmonoid (s i)) (Directed : ∀ i j, ∃ k, s i ⊆ s k ∧ s j ⊆ s k) :
IsSubmonoid (⋃ i, s i) :=
{ one_mem :=
let ⟨i⟩ := hι
Set.mem_iUnion.2 ⟨i, (hs i).one_mem⟩
mul_mem := fun ha hb =>
let ⟨i, hi⟩ := Set.mem_iUnion.1 ha
let ⟨j, hj⟩ := Set.mem_iUnion.1 hb
let ⟨k, hk⟩ := Directed i j
Set.mem_iUnion.2 ⟨k, (hs k).mul_mem (hk.1 hi) (hk.2 hj)⟩ }
#align is_submonoid_Union_of_directed isSubmonoid_iUnion_of_directed
#align is_add_submonoid_Union_of_directed isAddSubmonoid_iUnion_of_directed
namespace IsSubmonoid
@[to_additive
"The sum of a list of elements of an `AddSubmonoid` is an element of the `AddSubmonoid`."]
| Mathlib/Deprecated/Submonoid.lean | 232 | 237 | theorem list_prod_mem (hs : IsSubmonoid s) : ∀ {l : List M}, (∀ x ∈ l, x ∈ s) → l.prod ∈ s
| [], _ => hs.one_mem
| a :: l, h =>
suffices a * l.prod ∈ s by simpa
have : a ∈ s ∧ ∀ x ∈ l, x ∈ s := by | simpa using h
hs.mul_mem this.1 (list_prod_mem hs this.2)
|
import Mathlib.Algebra.GroupPower.IterateHom
import Mathlib.Algebra.Polynomial.Eval
import Mathlib.GroupTheory.GroupAction.Ring
#align_import data.polynomial.derivative from "leanprover-community/mathlib"@"bbeb185db4ccee8ed07dc48449414ebfa39cb821"
noncomputable section
open Finset
open Polynomial
namespace Polynomial
universe u v w y z
variable {R : Type u} {S : Type v} {T : Type w} {ι : Type y} {A : Type z} {a b : R} {n : ℕ}
section Derivative
section Semiring
variable [Semiring R]
def derivative : R[X] →ₗ[R] R[X] where
toFun p := p.sum fun n a => C (a * n) * X ^ (n - 1)
map_add' p q := by
dsimp only
rw [sum_add_index] <;>
simp only [add_mul, forall_const, RingHom.map_add, eq_self_iff_true, zero_mul,
RingHom.map_zero]
map_smul' a p := by
dsimp; rw [sum_smul_index] <;>
simp only [mul_sum, ← C_mul', mul_assoc, coeff_C_mul, RingHom.map_mul, forall_const, zero_mul,
RingHom.map_zero, sum]
#align polynomial.derivative Polynomial.derivative
theorem derivative_apply (p : R[X]) : derivative p = p.sum fun n a => C (a * n) * X ^ (n - 1) :=
rfl
#align polynomial.derivative_apply Polynomial.derivative_apply
theorem coeff_derivative (p : R[X]) (n : ℕ) :
coeff (derivative p) n = coeff p (n + 1) * (n + 1) := by
rw [derivative_apply]
simp only [coeff_X_pow, coeff_sum, coeff_C_mul]
rw [sum, Finset.sum_eq_single (n + 1)]
· simp only [Nat.add_succ_sub_one, add_zero, mul_one, if_true, eq_self_iff_true]; norm_cast
· intro b
cases b
· intros
rw [Nat.cast_zero, mul_zero, zero_mul]
· intro _ H
rw [Nat.add_one_sub_one, if_neg (mt (congr_arg Nat.succ) H.symm), mul_zero]
· rw [if_pos (add_tsub_cancel_right n 1).symm, mul_one, Nat.cast_add, Nat.cast_one,
mem_support_iff]
intro h
push_neg at h
simp [h]
#align polynomial.coeff_derivative Polynomial.coeff_derivative
-- Porting note (#10618): removed `simp`: `simp` can prove it.
theorem derivative_zero : derivative (0 : R[X]) = 0 :=
derivative.map_zero
#align polynomial.derivative_zero Polynomial.derivative_zero
theorem iterate_derivative_zero {k : ℕ} : derivative^[k] (0 : R[X]) = 0 :=
iterate_map_zero derivative k
#align polynomial.iterate_derivative_zero Polynomial.iterate_derivative_zero
@[simp]
theorem derivative_monomial (a : R) (n : ℕ) :
derivative (monomial n a) = monomial (n - 1) (a * n) := by
rw [derivative_apply, sum_monomial_index, C_mul_X_pow_eq_monomial]
simp
#align polynomial.derivative_monomial Polynomial.derivative_monomial
theorem derivative_C_mul_X (a : R) : derivative (C a * X) = C a := by
simp [C_mul_X_eq_monomial, derivative_monomial, Nat.cast_one, mul_one]
set_option linter.uppercaseLean3 false in
#align polynomial.derivative_C_mul_X Polynomial.derivative_C_mul_X
theorem derivative_C_mul_X_pow (a : R) (n : ℕ) :
derivative (C a * X ^ n) = C (a * n) * X ^ (n - 1) := by
rw [C_mul_X_pow_eq_monomial, C_mul_X_pow_eq_monomial, derivative_monomial]
set_option linter.uppercaseLean3 false in
#align polynomial.derivative_C_mul_X_pow Polynomial.derivative_C_mul_X_pow
theorem derivative_C_mul_X_sq (a : R) : derivative (C a * X ^ 2) = C (a * 2) * X := by
rw [derivative_C_mul_X_pow, Nat.cast_two, pow_one]
set_option linter.uppercaseLean3 false in
#align polynomial.derivative_C_mul_X_sq Polynomial.derivative_C_mul_X_sq
@[simp]
theorem derivative_X_pow (n : ℕ) : derivative (X ^ n : R[X]) = C (n : R) * X ^ (n - 1) := by
convert derivative_C_mul_X_pow (1 : R) n <;> simp
set_option linter.uppercaseLean3 false in
#align polynomial.derivative_X_pow Polynomial.derivative_X_pow
-- Porting note (#10618): removed `simp`: `simp` can prove it.
| Mathlib/Algebra/Polynomial/Derivative.lean | 115 | 116 | theorem derivative_X_sq : derivative (X ^ 2 : R[X]) = C 2 * X := by |
rw [derivative_X_pow, Nat.cast_two, pow_one]
|
import Mathlib.CategoryTheory.EpiMono
import Mathlib.CategoryTheory.Limits.HasLimits
#align_import category_theory.limits.shapes.equalizers from "leanprover-community/mathlib"@"4698e35ca56a0d4fa53aa5639c3364e0a77f4eba"
section
open CategoryTheory Opposite
namespace CategoryTheory.Limits
-- attribute [local tidy] tactic.case_bash -- Porting note: no tidy nor cases_bash
universe v v₂ u u₂
inductive WalkingParallelPair : Type
| zero
| one
deriving DecidableEq, Inhabited
#align category_theory.limits.walking_parallel_pair CategoryTheory.Limits.WalkingParallelPair
open WalkingParallelPair
inductive WalkingParallelPairHom : WalkingParallelPair → WalkingParallelPair → Type
| left : WalkingParallelPairHom zero one
| right : WalkingParallelPairHom zero one
| id (X : WalkingParallelPair) : WalkingParallelPairHom X X
deriving DecidableEq
#align category_theory.limits.walking_parallel_pair_hom CategoryTheory.Limits.WalkingParallelPairHom
attribute [-simp, nolint simpNF] WalkingParallelPairHom.id.sizeOf_spec
instance : Inhabited (WalkingParallelPairHom zero one) where default := WalkingParallelPairHom.left
open WalkingParallelPairHom
def WalkingParallelPairHom.comp :
-- Porting note: changed X Y Z to implicit to match comp fields in precategory
∀ { X Y Z : WalkingParallelPair } (_ : WalkingParallelPairHom X Y)
(_ : WalkingParallelPairHom Y Z), WalkingParallelPairHom X Z
| _, _, _, id _, h => h
| _, _, _, left, id one => left
| _, _, _, right, id one => right
#align category_theory.limits.walking_parallel_pair_hom.comp CategoryTheory.Limits.WalkingParallelPairHom.comp
-- Porting note: adding these since they are simple and aesop couldn't directly prove them
theorem WalkingParallelPairHom.id_comp
{X Y : WalkingParallelPair} (g : WalkingParallelPairHom X Y) : comp (id X) g = g :=
rfl
theorem WalkingParallelPairHom.comp_id
{X Y : WalkingParallelPair} (f : WalkingParallelPairHom X Y) : comp f (id Y) = f := by
cases f <;> rfl
theorem WalkingParallelPairHom.assoc {X Y Z W : WalkingParallelPair}
(f : WalkingParallelPairHom X Y) (g: WalkingParallelPairHom Y Z)
(h : WalkingParallelPairHom Z W) : comp (comp f g) h = comp f (comp g h) := by
cases f <;> cases g <;> cases h <;> rfl
instance walkingParallelPairHomCategory : SmallCategory WalkingParallelPair where
Hom := WalkingParallelPairHom
id := id
comp := comp
comp_id := comp_id
id_comp := id_comp
assoc := assoc
#align category_theory.limits.walking_parallel_pair_hom_category CategoryTheory.Limits.walkingParallelPairHomCategory
@[simp]
theorem walkingParallelPairHom_id (X : WalkingParallelPair) : WalkingParallelPairHom.id X = 𝟙 X :=
rfl
#align category_theory.limits.walking_parallel_pair_hom_id CategoryTheory.Limits.walkingParallelPairHom_id
-- Porting note: simpNF asked me to do this because the LHS of the non-primed version reduced
@[simp]
theorem WalkingParallelPairHom.id.sizeOf_spec' (X : WalkingParallelPair) :
(WalkingParallelPairHom._sizeOf_inst X X).sizeOf (𝟙 X) = 1 + sizeOf X := by cases X <;> rfl
def walkingParallelPairOp : WalkingParallelPair ⥤ WalkingParallelPairᵒᵖ where
obj x := op <| by cases x; exacts [one, zero]
map f := by
cases f <;> apply Quiver.Hom.op
exacts [left, right, WalkingParallelPairHom.id _]
map_comp := by rintro _ _ _ (_|_|_) g <;> cases g <;> rfl
#align category_theory.limits.walking_parallel_pair_op CategoryTheory.Limits.walkingParallelPairOp
@[simp]
theorem walkingParallelPairOp_zero : walkingParallelPairOp.obj zero = op one := rfl
#align category_theory.limits.walking_parallel_pair_op_zero CategoryTheory.Limits.walkingParallelPairOp_zero
@[simp]
theorem walkingParallelPairOp_one : walkingParallelPairOp.obj one = op zero := rfl
#align category_theory.limits.walking_parallel_pair_op_one CategoryTheory.Limits.walkingParallelPairOp_one
@[simp]
theorem walkingParallelPairOp_left :
walkingParallelPairOp.map left = @Quiver.Hom.op _ _ zero one left := rfl
#align category_theory.limits.walking_parallel_pair_op_left CategoryTheory.Limits.walkingParallelPairOp_left
@[simp]
theorem walkingParallelPairOp_right :
walkingParallelPairOp.map right = @Quiver.Hom.op _ _ zero one right := rfl
#align category_theory.limits.walking_parallel_pair_op_right CategoryTheory.Limits.walkingParallelPairOp_right
@[simps functor inverse]
def walkingParallelPairOpEquiv : WalkingParallelPair ≌ WalkingParallelPairᵒᵖ where
functor := walkingParallelPairOp
inverse := walkingParallelPairOp.leftOp
unitIso :=
NatIso.ofComponents (fun j => eqToIso (by cases j <;> rfl))
(by rintro _ _ (_ | _ | _) <;> simp)
counitIso :=
NatIso.ofComponents (fun j => eqToIso (by
induction' j with X
cases X <;> rfl))
(fun {i} {j} f => by
induction' i with i
induction' j with j
let g := f.unop
have : f = g.op := rfl
rw [this]
cases i <;> cases j <;> cases g <;> rfl)
functor_unitIso_comp := fun j => by cases j <;> rfl
#align category_theory.limits.walking_parallel_pair_op_equiv CategoryTheory.Limits.walkingParallelPairOpEquiv
@[simp]
theorem walkingParallelPairOpEquiv_unitIso_zero :
walkingParallelPairOpEquiv.unitIso.app zero = Iso.refl zero := rfl
#align category_theory.limits.walking_parallel_pair_op_equiv_unit_iso_zero CategoryTheory.Limits.walkingParallelPairOpEquiv_unitIso_zero
@[simp]
theorem walkingParallelPairOpEquiv_unitIso_one :
walkingParallelPairOpEquiv.unitIso.app one = Iso.refl one := rfl
#align category_theory.limits.walking_parallel_pair_op_equiv_unit_iso_one CategoryTheory.Limits.walkingParallelPairOpEquiv_unitIso_one
@[simp]
theorem walkingParallelPairOpEquiv_counitIso_zero :
walkingParallelPairOpEquiv.counitIso.app (op zero) = Iso.refl (op zero) := rfl
#align category_theory.limits.walking_parallel_pair_op_equiv_counit_iso_zero CategoryTheory.Limits.walkingParallelPairOpEquiv_counitIso_zero
@[simp]
theorem walkingParallelPairOpEquiv_counitIso_one :
walkingParallelPairOpEquiv.counitIso.app (op one) = Iso.refl (op one) :=
rfl
#align category_theory.limits.walking_parallel_pair_op_equiv_counit_iso_one CategoryTheory.Limits.walkingParallelPairOpEquiv_counitIso_one
variable {C : Type u} [Category.{v} C]
variable {X Y : C}
def parallelPair (f g : X ⟶ Y) : WalkingParallelPair ⥤ C where
obj x :=
match x with
| zero => X
| one => Y
map h :=
match h with
| WalkingParallelPairHom.id _ => 𝟙 _
| left => f
| right => g
-- `sorry` can cope with this, but it's too slow:
map_comp := by
rintro _ _ _ ⟨⟩ g <;> cases g <;> {dsimp; simp}
#align category_theory.limits.parallel_pair CategoryTheory.Limits.parallelPair
@[simp]
theorem parallelPair_obj_zero (f g : X ⟶ Y) : (parallelPair f g).obj zero = X := rfl
#align category_theory.limits.parallel_pair_obj_zero CategoryTheory.Limits.parallelPair_obj_zero
@[simp]
theorem parallelPair_obj_one (f g : X ⟶ Y) : (parallelPair f g).obj one = Y := rfl
#align category_theory.limits.parallel_pair_obj_one CategoryTheory.Limits.parallelPair_obj_one
@[simp]
theorem parallelPair_map_left (f g : X ⟶ Y) : (parallelPair f g).map left = f := rfl
#align category_theory.limits.parallel_pair_map_left CategoryTheory.Limits.parallelPair_map_left
@[simp]
theorem parallelPair_map_right (f g : X ⟶ Y) : (parallelPair f g).map right = g := rfl
#align category_theory.limits.parallel_pair_map_right CategoryTheory.Limits.parallelPair_map_right
@[simp]
theorem parallelPair_functor_obj {F : WalkingParallelPair ⥤ C} (j : WalkingParallelPair) :
(parallelPair (F.map left) (F.map right)).obj j = F.obj j := by cases j <;> rfl
#align category_theory.limits.parallel_pair_functor_obj CategoryTheory.Limits.parallelPair_functor_obj
@[simps!]
def diagramIsoParallelPair (F : WalkingParallelPair ⥤ C) :
F ≅ parallelPair (F.map left) (F.map right) :=
NatIso.ofComponents (fun j => eqToIso <| by cases j <;> rfl) (by rintro _ _ (_|_|_) <;> simp)
#align category_theory.limits.diagram_iso_parallel_pair CategoryTheory.Limits.diagramIsoParallelPair
def parallelPairHom {X' Y' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : X ⟶ X') (q : Y ⟶ Y')
(wf : f ≫ q = p ≫ f') (wg : g ≫ q = p ≫ g') : parallelPair f g ⟶ parallelPair f' g' where
app j :=
match j with
| zero => p
| one => q
naturality := by
rintro _ _ ⟨⟩ <;> {dsimp; simp [wf,wg]}
#align category_theory.limits.parallel_pair_hom CategoryTheory.Limits.parallelPairHom
@[simp]
theorem parallelPairHom_app_zero {X' Y' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : X ⟶ X')
(q : Y ⟶ Y') (wf : f ≫ q = p ≫ f') (wg : g ≫ q = p ≫ g') :
(parallelPairHom f g f' g' p q wf wg).app zero = p :=
rfl
#align category_theory.limits.parallel_pair_hom_app_zero CategoryTheory.Limits.parallelPairHom_app_zero
@[simp]
theorem parallelPairHom_app_one {X' Y' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : X ⟶ X')
(q : Y ⟶ Y') (wf : f ≫ q = p ≫ f') (wg : g ≫ q = p ≫ g') :
(parallelPairHom f g f' g' p q wf wg).app one = q :=
rfl
#align category_theory.limits.parallel_pair_hom_app_one CategoryTheory.Limits.parallelPairHom_app_one
@[simps!]
def parallelPair.ext {F G : WalkingParallelPair ⥤ C} (zero : F.obj zero ≅ G.obj zero)
(one : F.obj one ≅ G.obj one) (left : F.map left ≫ one.hom = zero.hom ≫ G.map left)
(right : F.map right ≫ one.hom = zero.hom ≫ G.map right) : F ≅ G :=
NatIso.ofComponents
(by
rintro ⟨j⟩
exacts [zero, one])
(by rintro _ _ ⟨_⟩ <;> simp [left, right])
#align category_theory.limits.parallel_pair.ext CategoryTheory.Limits.parallelPair.ext
@[simps!]
def parallelPair.eqOfHomEq {f g f' g' : X ⟶ Y} (hf : f = f') (hg : g = g') :
parallelPair f g ≅ parallelPair f' g' :=
parallelPair.ext (Iso.refl _) (Iso.refl _) (by simp [hf]) (by simp [hg])
#align category_theory.limits.parallel_pair.eq_of_hom_eq CategoryTheory.Limits.parallelPair.eqOfHomEq
abbrev Fork (f g : X ⟶ Y) :=
Cone (parallelPair f g)
#align category_theory.limits.fork CategoryTheory.Limits.Fork
abbrev Cofork (f g : X ⟶ Y) :=
Cocone (parallelPair f g)
#align category_theory.limits.cofork CategoryTheory.Limits.Cofork
variable {f g : X ⟶ Y}
def Fork.ι (t : Fork f g) :=
t.π.app zero
#align category_theory.limits.fork.ι CategoryTheory.Limits.Fork.ι
@[simp]
theorem Fork.app_zero_eq_ι (t : Fork f g) : t.π.app zero = t.ι :=
rfl
#align category_theory.limits.fork.app_zero_eq_ι CategoryTheory.Limits.Fork.app_zero_eq_ι
def Cofork.π (t : Cofork f g) :=
t.ι.app one
#align category_theory.limits.cofork.π CategoryTheory.Limits.Cofork.π
@[simp]
theorem Cofork.app_one_eq_π (t : Cofork f g) : t.ι.app one = t.π :=
rfl
#align category_theory.limits.cofork.app_one_eq_π CategoryTheory.Limits.Cofork.app_one_eq_π
@[simp]
theorem Fork.app_one_eq_ι_comp_left (s : Fork f g) : s.π.app one = s.ι ≫ f := by
rw [← s.app_zero_eq_ι, ← s.w left, parallelPair_map_left]
#align category_theory.limits.fork.app_one_eq_ι_comp_left CategoryTheory.Limits.Fork.app_one_eq_ι_comp_left
@[reassoc]
| Mathlib/CategoryTheory/Limits/Shapes/Equalizers.lean | 342 | 343 | theorem Fork.app_one_eq_ι_comp_right (s : Fork f g) : s.π.app one = s.ι ≫ g := by |
rw [← s.app_zero_eq_ι, ← s.w right, parallelPair_map_right]
|
import Mathlib.CategoryTheory.Filtered.Connected
import Mathlib.CategoryTheory.Limits.TypesFiltered
import Mathlib.CategoryTheory.Limits.Final
universe v₁ v₂ u₁ u₂
namespace CategoryTheory
open CategoryTheory.Limits CategoryTheory.Functor Opposite
section ArbitraryUniverses
variable {C : Type u₁} [Category.{v₁} C] {D : Type u₂} [Category.{v₂} D] (F : C ⥤ D)
theorem Functor.final_of_isFiltered_structuredArrow [∀ d, IsFiltered (StructuredArrow d F)] :
Final F where
out _ := IsFiltered.isConnected _
theorem Functor.initial_of_isCofiltered_costructuredArrow
[∀ d, IsCofiltered (CostructuredArrow F d)] : Initial F where
out _ := IsCofiltered.isConnected _
theorem isFiltered_structuredArrow_of_isFiltered_of_exists [IsFilteredOrEmpty C]
(h₁ : ∀ d, ∃ c, Nonempty (d ⟶ F.obj c)) (h₂ : ∀ {d : D} {c : C} (s s' : d ⟶ F.obj c),
∃ (c' : C) (t : c ⟶ c'), s ≫ F.map t = s' ≫ F.map t) (d : D) :
IsFiltered (StructuredArrow d F) := by
have : Nonempty (StructuredArrow d F) := by
obtain ⟨c, ⟨f⟩⟩ := h₁ d
exact ⟨.mk f⟩
suffices IsFilteredOrEmpty (StructuredArrow d F) from IsFiltered.mk
refine ⟨fun f g => ?_, fun f g η μ => ?_⟩
· obtain ⟨c, ⟨t, ht⟩⟩ := h₂ (f.hom ≫ F.map (IsFiltered.leftToMax f.right g.right))
(g.hom ≫ F.map (IsFiltered.rightToMax f.right g.right))
refine ⟨.mk (f.hom ≫ F.map (IsFiltered.leftToMax f.right g.right ≫ t)), ?_, ?_, trivial⟩
· exact StructuredArrow.homMk (IsFiltered.leftToMax _ _ ≫ t) rfl
· exact StructuredArrow.homMk (IsFiltered.rightToMax _ _ ≫ t) (by simpa using ht.symm)
· refine ⟨.mk (f.hom ≫ F.map (η.right ≫ IsFiltered.coeqHom η.right μ.right)),
StructuredArrow.homMk (IsFiltered.coeqHom η.right μ.right) (by simp), ?_⟩
simpa using IsFiltered.coeq_condition _ _
theorem isCofiltered_costructuredArrow_of_isCofiltered_of_exists [IsCofilteredOrEmpty C]
(h₁ : ∀ d, ∃ c, Nonempty (F.obj c ⟶ d)) (h₂ : ∀ {d : D} {c : C} (s s' : F.obj c ⟶ d),
∃ (c' : C) (t : c' ⟶ c), F.map t ≫ s = F.map t ≫ s') (d : D) :
IsCofiltered (CostructuredArrow F d) := by
suffices IsFiltered (CostructuredArrow F d)ᵒᵖ from isCofiltered_of_isFiltered_op _
suffices IsFiltered (StructuredArrow (op d) F.op) from
IsFiltered.of_equivalence (costructuredArrowOpEquivalence _ _).symm
apply isFiltered_structuredArrow_of_isFiltered_of_exists
· intro d
obtain ⟨c, ⟨t⟩⟩ := h₁ d.unop
exact ⟨op c, ⟨Quiver.Hom.op t⟩⟩
· intro d c s s'
obtain ⟨c', t, ht⟩ := h₂ s.unop s'.unop
exact ⟨op c', Quiver.Hom.op t, Quiver.Hom.unop_inj ht⟩
theorem Functor.final_of_exists_of_isFiltered [IsFilteredOrEmpty C]
(h₁ : ∀ d, ∃ c, Nonempty (d ⟶ F.obj c)) (h₂ : ∀ {d : D} {c : C} (s s' : d ⟶ F.obj c),
∃ (c' : C) (t : c ⟶ c'), s ≫ F.map t = s' ≫ F.map t) : Functor.Final F := by
suffices ∀ d, IsFiltered (StructuredArrow d F) from final_of_isFiltered_structuredArrow F
exact isFiltered_structuredArrow_of_isFiltered_of_exists F h₁ h₂
theorem Functor.initial_of_exists_of_isCofiltered [IsCofilteredOrEmpty C]
(h₁ : ∀ d, ∃ c, Nonempty (F.obj c ⟶ d)) (h₂ : ∀ {d : D} {c : C} (s s' : F.obj c ⟶ d),
∃ (c' : C) (t : c' ⟶ c), F.map t ≫ s = F.map t ≫ s') : Functor.Initial F := by
suffices ∀ d, IsCofiltered (CostructuredArrow F d) from
initial_of_isCofiltered_costructuredArrow F
exact isCofiltered_costructuredArrow_of_isCofiltered_of_exists F h₁ h₂
theorem IsFilteredOrEmpty.of_exists_of_isFiltered_of_fullyFaithful [IsFilteredOrEmpty D] [F.Full]
[F.Faithful] (h : ∀ d, ∃ c, Nonempty (d ⟶ F.obj c)) : IsFilteredOrEmpty C where
cocone_objs c c' := by
obtain ⟨c₀, ⟨f⟩⟩ := h (IsFiltered.max (F.obj c) (F.obj c'))
exact ⟨c₀, F.preimage (IsFiltered.leftToMax _ _ ≫ f),
F.preimage (IsFiltered.rightToMax _ _ ≫ f), trivial⟩
cocone_maps {c c'} f g := by
obtain ⟨c₀, ⟨f₀⟩⟩ := h (IsFiltered.coeq (F.map f) (F.map g))
refine ⟨_, F.preimage (IsFiltered.coeqHom (F.map f) (F.map g) ≫ f₀), F.map_injective ?_⟩
simp [reassoc_of% (IsFiltered.coeq_condition (F.map f) (F.map g))]
theorem IsCofilteredOrEmpty.of_exists_of_isCofiltered_of_fullyFaithful [IsCofilteredOrEmpty D]
[F.Full] [F.Faithful] (h : ∀ d, ∃ c, Nonempty (F.obj c ⟶ d)) : IsCofilteredOrEmpty C := by
suffices IsFilteredOrEmpty Cᵒᵖ from isCofilteredOrEmpty_of_isFilteredOrEmpty_op _
refine IsFilteredOrEmpty.of_exists_of_isFiltered_of_fullyFaithful F.op (fun d => ?_)
obtain ⟨c, ⟨f⟩⟩ := h d.unop
exact ⟨op c, ⟨f.op⟩⟩
| Mathlib/CategoryTheory/Filtered/Final.lean | 130 | 136 | theorem IsFiltered.of_exists_of_isFiltered_of_fullyFaithful [IsFiltered D] [F.Full] [F.Faithful]
(h : ∀ d, ∃ c, Nonempty (d ⟶ F.obj c)) : IsFiltered C :=
{ IsFilteredOrEmpty.of_exists_of_isFiltered_of_fullyFaithful F h with
nonempty := by |
have : Nonempty D := IsFiltered.nonempty
obtain ⟨c, -⟩ := h (Classical.arbitrary D)
exact ⟨c⟩ }
|
import Mathlib.Data.Multiset.Nodup
#align_import data.multiset.sum from "leanprover-community/mathlib"@"9003f28797c0664a49e4179487267c494477d853"
open Sum
namespace Multiset
variable {α β : Type*} (s : Multiset α) (t : Multiset β)
def disjSum : Multiset (Sum α β) :=
s.map inl + t.map inr
#align multiset.disj_sum Multiset.disjSum
@[simp]
theorem zero_disjSum : (0 : Multiset α).disjSum t = t.map inr :=
zero_add _
#align multiset.zero_disj_sum Multiset.zero_disjSum
@[simp]
theorem disjSum_zero : s.disjSum (0 : Multiset β) = s.map inl :=
add_zero _
#align multiset.disj_sum_zero Multiset.disjSum_zero
@[simp]
theorem card_disjSum : Multiset.card (s.disjSum t) = Multiset.card s + Multiset.card t := by
rw [disjSum, card_add, card_map, card_map]
#align multiset.card_disj_sum Multiset.card_disjSum
variable {s t} {s₁ s₂ : Multiset α} {t₁ t₂ : Multiset β} {a : α} {b : β} {x : Sum α β}
theorem mem_disjSum : x ∈ s.disjSum t ↔ (∃ a, a ∈ s ∧ inl a = x) ∨ ∃ b, b ∈ t ∧ inr b = x := by
simp_rw [disjSum, mem_add, mem_map]
#align multiset.mem_disj_sum Multiset.mem_disjSum
@[simp]
| Mathlib/Data/Multiset/Sum.lean | 55 | 60 | theorem inl_mem_disjSum : inl a ∈ s.disjSum t ↔ a ∈ s := by |
rw [mem_disjSum, or_iff_left]
-- Porting note: Previous code for L62 was: simp only [exists_eq_right]
· simp only [inl.injEq, exists_eq_right]
rintro ⟨b, _, hb⟩
exact inr_ne_inl hb
|
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
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
-- Porting note: generalized to `ι : Sort*`
theorem isCompact_iUnion {ι : Sort*} {f : ι → Set X} [Finite ι] (h : ∀ i, IsCompact (f i)) :
IsCompact (⋃ i, f i) :=
(finite_range f).isCompact_sUnion <| forall_mem_range.2 h
#align is_compact_Union isCompact_iUnion
theorem Set.Finite.isCompact (hs : s.Finite) : IsCompact s :=
biUnion_of_singleton s ▸ hs.isCompact_biUnion fun _ _ => isCompact_singleton
#align set.finite.is_compact Set.Finite.isCompact
theorem IsCompact.finite_of_discrete [DiscreteTopology X] (hs : IsCompact s) : s.Finite := by
have : ∀ x : X, ({x} : Set X) ∈ 𝓝 x := by simp [nhds_discrete]
rcases hs.elim_nhds_subcover (fun x => {x}) fun x _ => this x with ⟨t, _, hst⟩
simp only [← t.set_biUnion_coe, biUnion_of_singleton] at hst
exact t.finite_toSet.subset hst
#align is_compact.finite_of_discrete IsCompact.finite_of_discrete
theorem isCompact_iff_finite [DiscreteTopology X] : IsCompact s ↔ s.Finite :=
⟨fun h => h.finite_of_discrete, fun h => h.isCompact⟩
#align is_compact_iff_finite isCompact_iff_finite
theorem IsCompact.union (hs : IsCompact s) (ht : IsCompact t) : IsCompact (s ∪ t) := by
rw [union_eq_iUnion]; exact isCompact_iUnion fun b => by cases b <;> assumption
#align is_compact.union IsCompact.union
protected theorem IsCompact.insert (hs : IsCompact s) (a) : IsCompact (insert a s) :=
isCompact_singleton.union hs
#align is_compact.insert IsCompact.insert
-- Porting note (#11215): TODO: reformulate using `𝓝ˢ`
theorem exists_subset_nhds_of_isCompact' [Nonempty ι] {V : ι → Set X}
(hV : Directed (· ⊇ ·) V) (hV_cpct : ∀ i, IsCompact (V i)) (hV_closed : ∀ i, IsClosed (V i))
{U : Set X} (hU : ∀ x ∈ ⋂ i, V i, U ∈ 𝓝 x) : ∃ i, V i ⊆ U := by
obtain ⟨W, hsubW, W_op, hWU⟩ := exists_open_set_nhds hU
suffices ∃ i, V i ⊆ W from this.imp fun i hi => hi.trans hWU
by_contra! H
replace H : ∀ i, (V i ∩ Wᶜ).Nonempty := fun i => Set.inter_compl_nonempty_iff.mpr (H i)
have : (⋂ i, V i ∩ Wᶜ).Nonempty := by
refine
IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed _ (fun i j => ?_) H
(fun i => (hV_cpct i).inter_right W_op.isClosed_compl) fun i =>
(hV_closed i).inter W_op.isClosed_compl
rcases hV i j with ⟨k, hki, hkj⟩
refine ⟨k, ⟨fun x => ?_, fun x => ?_⟩⟩ <;> simp only [and_imp, mem_inter_iff, mem_compl_iff] <;>
tauto
have : ¬⋂ i : ι, V i ⊆ W := by simpa [← iInter_inter, inter_compl_nonempty_iff]
contradiction
#align exists_subset_nhds_of_is_compact' exists_subset_nhds_of_isCompact'
lemma eq_finite_iUnion_of_isTopologicalBasis_of_isCompact_open (b : ι → Set X)
(hb : IsTopologicalBasis (Set.range b)) (U : Set X) (hUc : IsCompact U) (hUo : IsOpen U) :
∃ s : Set ι, s.Finite ∧ U = ⋃ i ∈ s, b i := by
obtain ⟨Y, f, e, hf⟩ := hb.open_eq_iUnion hUo
choose f' hf' using hf
have : b ∘ f' = f := funext hf'
subst this
obtain ⟨t, ht⟩ :=
hUc.elim_finite_subcover (b ∘ f') (fun i => hb.isOpen (Set.mem_range_self _)) (by rw [e])
refine ⟨t.image f', Set.toFinite _, le_antisymm ?_ ?_⟩
· refine Set.Subset.trans ht ?_
simp only [Set.iUnion_subset_iff]
intro i hi
erw [← Set.iUnion_subtype (fun x : ι => x ∈ t.image f') fun i => b i.1]
exact Set.subset_iUnion (fun i : t.image f' => b i) ⟨_, Finset.mem_image_of_mem _ hi⟩
· apply Set.iUnion₂_subset
rintro i hi
obtain ⟨j, -, rfl⟩ := Finset.mem_image.mp hi
rw [e]
exact Set.subset_iUnion (b ∘ f') j
lemma eq_sUnion_finset_of_isTopologicalBasis_of_isCompact_open (b : Set (Set X))
(hb : IsTopologicalBasis b) (U : Set X) (hUc : IsCompact U) (hUo : IsOpen U) :
∃ s : Finset b, U = s.toSet.sUnion := by
have hb' : b = range (fun i ↦ i : b → Set X) := by simp
rw [hb'] at hb
choose s hs hU using eq_finite_iUnion_of_isTopologicalBasis_of_isCompact_open _ hb U hUc hUo
have : Finite s := hs
let _ : Fintype s := Fintype.ofFinite _
use s.toFinset
simp [hU]
theorem isCompact_open_iff_eq_finite_iUnion_of_isTopologicalBasis (b : ι → Set X)
(hb : IsTopologicalBasis (Set.range b)) (hb' : ∀ i, IsCompact (b i)) (U : Set X) :
IsCompact U ∧ IsOpen U ↔ ∃ s : Set ι, s.Finite ∧ U = ⋃ i ∈ s, b i := by
constructor
· exact fun ⟨h₁, h₂⟩ ↦ eq_finite_iUnion_of_isTopologicalBasis_of_isCompact_open _ hb U h₁ h₂
· rintro ⟨s, hs, rfl⟩
constructor
· exact hs.isCompact_biUnion fun i _ => hb' i
· exact isOpen_biUnion fun i _ => hb.isOpen (Set.mem_range_self _)
#align is_compact_open_iff_eq_finite_Union_of_is_topological_basis isCompact_open_iff_eq_finite_iUnion_of_isTopologicalBasis
namespace Filter
theorem hasBasis_cocompact : (cocompact X).HasBasis IsCompact compl :=
hasBasis_biInf_principal'
(fun s hs t ht =>
⟨s ∪ t, hs.union ht, compl_subset_compl.2 subset_union_left,
compl_subset_compl.2 subset_union_right⟩)
⟨∅, isCompact_empty⟩
#align filter.has_basis_cocompact Filter.hasBasis_cocompact
theorem mem_cocompact : s ∈ cocompact X ↔ ∃ t, IsCompact t ∧ tᶜ ⊆ s :=
hasBasis_cocompact.mem_iff
#align filter.mem_cocompact Filter.mem_cocompact
theorem mem_cocompact' : s ∈ cocompact X ↔ ∃ t, IsCompact t ∧ sᶜ ⊆ t :=
mem_cocompact.trans <| exists_congr fun _ => and_congr_right fun _ => compl_subset_comm
#align filter.mem_cocompact' Filter.mem_cocompact'
theorem _root_.IsCompact.compl_mem_cocompact (hs : IsCompact s) : sᶜ ∈ Filter.cocompact X :=
hasBasis_cocompact.mem_of_mem hs
#align is_compact.compl_mem_cocompact IsCompact.compl_mem_cocompact
theorem cocompact_le_cofinite : cocompact X ≤ cofinite := fun s hs =>
compl_compl s ▸ hs.isCompact.compl_mem_cocompact
#align filter.cocompact_le_cofinite Filter.cocompact_le_cofinite
theorem cocompact_eq_cofinite (X : Type*) [TopologicalSpace X] [DiscreteTopology X] :
cocompact X = cofinite := by
simp only [cocompact, hasBasis_cofinite.eq_biInf, isCompact_iff_finite]
#align filter.cocompact_eq_cofinite Filter.cocompact_eq_cofinite
theorem disjoint_cocompact_left (f : Filter X) :
Disjoint (Filter.cocompact X) f ↔ ∃ K ∈ f, IsCompact K := by
simp_rw [hasBasis_cocompact.disjoint_iff_left, compl_compl]
tauto
theorem disjoint_cocompact_right (f : Filter X) :
Disjoint f (Filter.cocompact X) ↔ ∃ K ∈ f, IsCompact K := by
simp_rw [hasBasis_cocompact.disjoint_iff_right, compl_compl]
tauto
@[deprecated "see `cocompact_eq_atTop` with `import Mathlib.Topology.Instances.Nat`"
(since := "2024-02-07")]
theorem _root_.Nat.cocompact_eq : cocompact ℕ = atTop :=
(cocompact_eq_cofinite ℕ).trans Nat.cofinite_eq_atTop
#align nat.cocompact_eq Nat.cocompact_eq
| Mathlib/Topology/Compactness/Compact.lean | 648 | 662 | theorem Tendsto.isCompact_insert_range_of_cocompact {f : X → Y} {y}
(hf : Tendsto f (cocompact X) (𝓝 y)) (hfc : Continuous f) : IsCompact (insert y (range f)) := by |
intro l hne hle
by_cases hy : ClusterPt y l
· exact ⟨y, Or.inl rfl, hy⟩
simp only [clusterPt_iff, not_forall, ← not_disjoint_iff_nonempty_inter, not_not] at hy
rcases hy with ⟨s, hsy, t, htl, hd⟩
rcases mem_cocompact.1 (hf hsy) with ⟨K, hKc, hKs⟩
have : f '' K ∈ l := by
filter_upwards [htl, le_principal_iff.1 hle] with y hyt hyf
rcases hyf with (rfl | ⟨x, rfl⟩)
exacts [(hd.le_bot ⟨mem_of_mem_nhds hsy, hyt⟩).elim,
mem_image_of_mem _ (not_not.1 fun hxK => hd.le_bot ⟨hKs hxK, hyt⟩)]
rcases hKc.image hfc (le_principal_iff.2 this) with ⟨y, hy, hyl⟩
exact ⟨y, Or.inr <| image_subset_range _ _ hy, hyl⟩
|
import Mathlib.Init.ZeroOne
import Mathlib.Data.Set.Defs
import Mathlib.Order.Basic
import Mathlib.Order.SymmDiff
import Mathlib.Tactic.Tauto
import Mathlib.Tactic.ByContra
import Mathlib.Util.Delaborators
#align_import data.set.basic from "leanprover-community/mathlib"@"001ffdc42920050657fd45bd2b8bfbec8eaaeb29"
open Function
universe u v w x
namespace Set
variable {α : Type u} {s t : Set α}
instance instBooleanAlgebraSet : BooleanAlgebra (Set α) :=
{ (inferInstance : BooleanAlgebra (α → Prop)) with
sup := (· ∪ ·),
le := (· ≤ ·),
lt := fun s t => s ⊆ t ∧ ¬t ⊆ s,
inf := (· ∩ ·),
bot := ∅,
compl := (·ᶜ),
top := univ,
sdiff := (· \ ·) }
instance : HasSSubset (Set α) :=
⟨(· < ·)⟩
@[simp]
theorem top_eq_univ : (⊤ : Set α) = univ :=
rfl
#align set.top_eq_univ Set.top_eq_univ
@[simp]
theorem bot_eq_empty : (⊥ : Set α) = ∅ :=
rfl
#align set.bot_eq_empty Set.bot_eq_empty
@[simp]
theorem sup_eq_union : ((· ⊔ ·) : Set α → Set α → Set α) = (· ∪ ·) :=
rfl
#align set.sup_eq_union Set.sup_eq_union
@[simp]
theorem inf_eq_inter : ((· ⊓ ·) : Set α → Set α → Set α) = (· ∩ ·) :=
rfl
#align set.inf_eq_inter Set.inf_eq_inter
@[simp]
theorem le_eq_subset : ((· ≤ ·) : Set α → Set α → Prop) = (· ⊆ ·) :=
rfl
#align set.le_eq_subset Set.le_eq_subset
@[simp]
theorem lt_eq_ssubset : ((· < ·) : Set α → Set α → Prop) = (· ⊂ ·) :=
rfl
#align set.lt_eq_ssubset Set.lt_eq_ssubset
theorem le_iff_subset : s ≤ t ↔ s ⊆ t :=
Iff.rfl
#align set.le_iff_subset Set.le_iff_subset
theorem lt_iff_ssubset : s < t ↔ s ⊂ t :=
Iff.rfl
#align set.lt_iff_ssubset Set.lt_iff_ssubset
alias ⟨_root_.LE.le.subset, _root_.HasSubset.Subset.le⟩ := le_iff_subset
#align has_subset.subset.le HasSubset.Subset.le
alias ⟨_root_.LT.lt.ssubset, _root_.HasSSubset.SSubset.lt⟩ := lt_iff_ssubset
#align has_ssubset.ssubset.lt HasSSubset.SSubset.lt
instance PiSetCoe.canLift (ι : Type u) (α : ι → Type v) [∀ i, Nonempty (α i)] (s : Set ι) :
CanLift (∀ i : s, α i) (∀ i, α i) (fun f i => f i) fun _ => True :=
PiSubtype.canLift ι α s
#align set.pi_set_coe.can_lift Set.PiSetCoe.canLift
instance PiSetCoe.canLift' (ι : Type u) (α : Type v) [Nonempty α] (s : Set ι) :
CanLift (s → α) (ι → α) (fun f i => f i) fun _ => True :=
PiSetCoe.canLift ι (fun _ => α) s
#align set.pi_set_coe.can_lift' Set.PiSetCoe.canLift'
end Set
theorem Subtype.mem {α : Type*} {s : Set α} (p : s) : (p : α) ∈ s :=
p.prop
#align subtype.mem Subtype.mem
theorem Eq.subset {α} {s t : Set α} : s = t → s ⊆ t :=
fun h₁ _ h₂ => by rw [← h₁]; exact h₂
#align eq.subset Eq.subset
namespace Set
variable {α : Type u} {β : Type v} {γ : Type w} {ι : Sort x} {a b : α} {s s₁ s₂ t t₁ t₂ u : Set α}
instance : Inhabited (Set α) :=
⟨∅⟩
theorem ext_iff {s t : Set α} : s = t ↔ ∀ x, x ∈ s ↔ x ∈ t :=
⟨fun h x => by rw [h], ext⟩
#align set.ext_iff Set.ext_iff
@[trans]
theorem mem_of_mem_of_subset {x : α} {s t : Set α} (hx : x ∈ s) (h : s ⊆ t) : x ∈ t :=
h hx
#align set.mem_of_mem_of_subset Set.mem_of_mem_of_subset
theorem forall_in_swap {p : α → β → Prop} : (∀ a ∈ s, ∀ (b), p a b) ↔ ∀ (b), ∀ a ∈ s, p a b := by
tauto
#align set.forall_in_swap Set.forall_in_swap
theorem mem_setOf {a : α} {p : α → Prop} : a ∈ { x | p x } ↔ p a :=
Iff.rfl
#align set.mem_set_of Set.mem_setOf
theorem _root_.Membership.mem.out {p : α → Prop} {a : α} (h : a ∈ { x | p x }) : p a :=
h
#align has_mem.mem.out Membership.mem.out
theorem nmem_setOf_iff {a : α} {p : α → Prop} : a ∉ { x | p x } ↔ ¬p a :=
Iff.rfl
#align set.nmem_set_of_iff Set.nmem_setOf_iff
@[simp]
theorem setOf_mem_eq {s : Set α} : { x | x ∈ s } = s :=
rfl
#align set.set_of_mem_eq Set.setOf_mem_eq
theorem setOf_set {s : Set α} : setOf s = s :=
rfl
#align set.set_of_set Set.setOf_set
theorem setOf_app_iff {p : α → Prop} {x : α} : { x | p x } x ↔ p x :=
Iff.rfl
#align set.set_of_app_iff Set.setOf_app_iff
theorem mem_def {a : α} {s : Set α} : a ∈ s ↔ s a :=
Iff.rfl
#align set.mem_def Set.mem_def
theorem setOf_bijective : Bijective (setOf : (α → Prop) → Set α) :=
bijective_id
#align set.set_of_bijective Set.setOf_bijective
theorem subset_setOf {p : α → Prop} {s : Set α} : s ⊆ setOf p ↔ ∀ x, x ∈ s → p x :=
Iff.rfl
theorem setOf_subset {p : α → Prop} {s : Set α} : setOf p ⊆ s ↔ ∀ x, p x → x ∈ s :=
Iff.rfl
@[simp]
theorem setOf_subset_setOf {p q : α → Prop} : { a | p a } ⊆ { a | q a } ↔ ∀ a, p a → q a :=
Iff.rfl
#align set.set_of_subset_set_of Set.setOf_subset_setOf
theorem setOf_and {p q : α → Prop} : { a | p a ∧ q a } = { a | p a } ∩ { a | q a } :=
rfl
#align set.set_of_and Set.setOf_and
theorem setOf_or {p q : α → Prop} : { a | p a ∨ q a } = { a | p a } ∪ { a | q a } :=
rfl
#align set.set_of_or Set.setOf_or
instance : IsRefl (Set α) (· ⊆ ·) :=
show IsRefl (Set α) (· ≤ ·) by infer_instance
instance : IsTrans (Set α) (· ⊆ ·) :=
show IsTrans (Set α) (· ≤ ·) by infer_instance
instance : Trans ((· ⊆ ·) : Set α → Set α → Prop) (· ⊆ ·) (· ⊆ ·) :=
show Trans (· ≤ ·) (· ≤ ·) (· ≤ ·) by infer_instance
instance : IsAntisymm (Set α) (· ⊆ ·) :=
show IsAntisymm (Set α) (· ≤ ·) by infer_instance
instance : IsIrrefl (Set α) (· ⊂ ·) :=
show IsIrrefl (Set α) (· < ·) by infer_instance
instance : IsTrans (Set α) (· ⊂ ·) :=
show IsTrans (Set α) (· < ·) by infer_instance
instance : Trans ((· ⊂ ·) : Set α → Set α → Prop) (· ⊂ ·) (· ⊂ ·) :=
show Trans (· < ·) (· < ·) (· < ·) by infer_instance
instance : Trans ((· ⊂ ·) : Set α → Set α → Prop) (· ⊆ ·) (· ⊂ ·) :=
show Trans (· < ·) (· ≤ ·) (· < ·) by infer_instance
instance : Trans ((· ⊆ ·) : Set α → Set α → Prop) (· ⊂ ·) (· ⊂ ·) :=
show Trans (· ≤ ·) (· < ·) (· < ·) by infer_instance
instance : IsAsymm (Set α) (· ⊂ ·) :=
show IsAsymm (Set α) (· < ·) by infer_instance
instance : IsNonstrictStrictOrder (Set α) (· ⊆ ·) (· ⊂ ·) :=
⟨fun _ _ => Iff.rfl⟩
-- TODO(Jeremy): write a tactic to unfold specific instances of generic notation?
theorem subset_def : (s ⊆ t) = ∀ x, x ∈ s → x ∈ t :=
rfl
#align set.subset_def Set.subset_def
theorem ssubset_def : (s ⊂ t) = (s ⊆ t ∧ ¬t ⊆ s) :=
rfl
#align set.ssubset_def Set.ssubset_def
@[refl]
theorem Subset.refl (a : Set α) : a ⊆ a := fun _ => id
#align set.subset.refl Set.Subset.refl
theorem Subset.rfl {s : Set α} : s ⊆ s :=
Subset.refl s
#align set.subset.rfl Set.Subset.rfl
@[trans]
theorem Subset.trans {a b c : Set α} (ab : a ⊆ b) (bc : b ⊆ c) : a ⊆ c := fun _ h => bc <| ab h
#align set.subset.trans Set.Subset.trans
@[trans]
theorem mem_of_eq_of_mem {x y : α} {s : Set α} (hx : x = y) (h : y ∈ s) : x ∈ s :=
hx.symm ▸ h
#align set.mem_of_eq_of_mem Set.mem_of_eq_of_mem
theorem Subset.antisymm {a b : Set α} (h₁ : a ⊆ b) (h₂ : b ⊆ a) : a = b :=
Set.ext fun _ => ⟨@h₁ _, @h₂ _⟩
#align set.subset.antisymm Set.Subset.antisymm
theorem Subset.antisymm_iff {a b : Set α} : a = b ↔ a ⊆ b ∧ b ⊆ a :=
⟨fun e => ⟨e.subset, e.symm.subset⟩, fun ⟨h₁, h₂⟩ => Subset.antisymm h₁ h₂⟩
#align set.subset.antisymm_iff Set.Subset.antisymm_iff
-- an alternative name
theorem eq_of_subset_of_subset {a b : Set α} : a ⊆ b → b ⊆ a → a = b :=
Subset.antisymm
#align set.eq_of_subset_of_subset Set.eq_of_subset_of_subset
theorem mem_of_subset_of_mem {s₁ s₂ : Set α} {a : α} (h : s₁ ⊆ s₂) : a ∈ s₁ → a ∈ s₂ :=
@h _
#align set.mem_of_subset_of_mem Set.mem_of_subset_of_mem
theorem not_mem_subset (h : s ⊆ t) : a ∉ t → a ∉ s :=
mt <| mem_of_subset_of_mem h
#align set.not_mem_subset Set.not_mem_subset
theorem not_subset : ¬s ⊆ t ↔ ∃ a ∈ s, a ∉ t := by
simp only [subset_def, not_forall, exists_prop]
#align set.not_subset Set.not_subset
lemma eq_of_forall_subset_iff (h : ∀ u, s ⊆ u ↔ t ⊆ u) : s = t := eq_of_forall_ge_iff h
protected theorem eq_or_ssubset_of_subset (h : s ⊆ t) : s = t ∨ s ⊂ t :=
eq_or_lt_of_le h
#align set.eq_or_ssubset_of_subset Set.eq_or_ssubset_of_subset
theorem exists_of_ssubset {s t : Set α} (h : s ⊂ t) : ∃ x ∈ t, x ∉ s :=
not_subset.1 h.2
#align set.exists_of_ssubset Set.exists_of_ssubset
protected theorem ssubset_iff_subset_ne {s t : Set α} : s ⊂ t ↔ s ⊆ t ∧ s ≠ t :=
@lt_iff_le_and_ne (Set α) _ s t
#align set.ssubset_iff_subset_ne Set.ssubset_iff_subset_ne
theorem ssubset_iff_of_subset {s t : Set α} (h : s ⊆ t) : s ⊂ t ↔ ∃ x ∈ t, x ∉ s :=
⟨exists_of_ssubset, fun ⟨_, hxt, hxs⟩ => ⟨h, fun h => hxs <| h hxt⟩⟩
#align set.ssubset_iff_of_subset Set.ssubset_iff_of_subset
protected theorem ssubset_of_ssubset_of_subset {s₁ s₂ s₃ : Set α} (hs₁s₂ : s₁ ⊂ s₂)
(hs₂s₃ : s₂ ⊆ s₃) : s₁ ⊂ s₃ :=
⟨Subset.trans hs₁s₂.1 hs₂s₃, fun hs₃s₁ => hs₁s₂.2 (Subset.trans hs₂s₃ hs₃s₁)⟩
#align set.ssubset_of_ssubset_of_subset Set.ssubset_of_ssubset_of_subset
protected theorem ssubset_of_subset_of_ssubset {s₁ s₂ s₃ : Set α} (hs₁s₂ : s₁ ⊆ s₂)
(hs₂s₃ : s₂ ⊂ s₃) : s₁ ⊂ s₃ :=
⟨Subset.trans hs₁s₂ hs₂s₃.1, fun hs₃s₁ => hs₂s₃.2 (Subset.trans hs₃s₁ hs₁s₂)⟩
#align set.ssubset_of_subset_of_ssubset Set.ssubset_of_subset_of_ssubset
theorem not_mem_empty (x : α) : ¬x ∈ (∅ : Set α) :=
id
#align set.not_mem_empty Set.not_mem_empty
-- Porting note (#10618): removed `simp` because `simp` can prove it
theorem not_not_mem : ¬a ∉ s ↔ a ∈ s :=
not_not
#align set.not_not_mem Set.not_not_mem
-- Porting note: we seem to need parentheses at `(↥s)`,
-- even if we increase the right precedence of `↥` in `Mathlib.Tactic.Coe`.
-- Porting note: removed `simp` as it is competing with `nonempty_subtype`.
-- @[simp]
theorem nonempty_coe_sort {s : Set α} : Nonempty (↥s) ↔ s.Nonempty :=
nonempty_subtype
#align set.nonempty_coe_sort Set.nonempty_coe_sort
alias ⟨_, Nonempty.coe_sort⟩ := nonempty_coe_sort
#align set.nonempty.coe_sort Set.Nonempty.coe_sort
theorem nonempty_def : s.Nonempty ↔ ∃ x, x ∈ s :=
Iff.rfl
#align set.nonempty_def Set.nonempty_def
theorem nonempty_of_mem {x} (h : x ∈ s) : s.Nonempty :=
⟨x, h⟩
#align set.nonempty_of_mem Set.nonempty_of_mem
theorem Nonempty.not_subset_empty : s.Nonempty → ¬s ⊆ ∅
| ⟨_, hx⟩, hs => hs hx
#align set.nonempty.not_subset_empty Set.Nonempty.not_subset_empty
protected noncomputable def Nonempty.some (h : s.Nonempty) : α :=
Classical.choose h
#align set.nonempty.some Set.Nonempty.some
protected theorem Nonempty.some_mem (h : s.Nonempty) : h.some ∈ s :=
Classical.choose_spec h
#align set.nonempty.some_mem Set.Nonempty.some_mem
theorem Nonempty.mono (ht : s ⊆ t) (hs : s.Nonempty) : t.Nonempty :=
hs.imp ht
#align set.nonempty.mono Set.Nonempty.mono
theorem nonempty_of_not_subset (h : ¬s ⊆ t) : (s \ t).Nonempty :=
let ⟨x, xs, xt⟩ := not_subset.1 h
⟨x, xs, xt⟩
#align set.nonempty_of_not_subset Set.nonempty_of_not_subset
theorem nonempty_of_ssubset (ht : s ⊂ t) : (t \ s).Nonempty :=
nonempty_of_not_subset ht.2
#align set.nonempty_of_ssubset Set.nonempty_of_ssubset
theorem Nonempty.of_diff (h : (s \ t).Nonempty) : s.Nonempty :=
h.imp fun _ => And.left
#align set.nonempty.of_diff Set.Nonempty.of_diff
theorem nonempty_of_ssubset' (ht : s ⊂ t) : t.Nonempty :=
(nonempty_of_ssubset ht).of_diff
#align set.nonempty_of_ssubset' Set.nonempty_of_ssubset'
theorem Nonempty.inl (hs : s.Nonempty) : (s ∪ t).Nonempty :=
hs.imp fun _ => Or.inl
#align set.nonempty.inl Set.Nonempty.inl
theorem Nonempty.inr (ht : t.Nonempty) : (s ∪ t).Nonempty :=
ht.imp fun _ => Or.inr
#align set.nonempty.inr Set.Nonempty.inr
@[simp]
theorem union_nonempty : (s ∪ t).Nonempty ↔ s.Nonempty ∨ t.Nonempty :=
exists_or
#align set.union_nonempty Set.union_nonempty
theorem Nonempty.left (h : (s ∩ t).Nonempty) : s.Nonempty :=
h.imp fun _ => And.left
#align set.nonempty.left Set.Nonempty.left
theorem Nonempty.right (h : (s ∩ t).Nonempty) : t.Nonempty :=
h.imp fun _ => And.right
#align set.nonempty.right Set.Nonempty.right
theorem inter_nonempty : (s ∩ t).Nonempty ↔ ∃ x, x ∈ s ∧ x ∈ t :=
Iff.rfl
#align set.inter_nonempty Set.inter_nonempty
theorem inter_nonempty_iff_exists_left : (s ∩ t).Nonempty ↔ ∃ x ∈ s, x ∈ t := by
simp_rw [inter_nonempty]
#align set.inter_nonempty_iff_exists_left Set.inter_nonempty_iff_exists_left
theorem inter_nonempty_iff_exists_right : (s ∩ t).Nonempty ↔ ∃ x ∈ t, x ∈ s := by
simp_rw [inter_nonempty, and_comm]
#align set.inter_nonempty_iff_exists_right Set.inter_nonempty_iff_exists_right
theorem nonempty_iff_univ_nonempty : Nonempty α ↔ (univ : Set α).Nonempty :=
⟨fun ⟨x⟩ => ⟨x, trivial⟩, fun ⟨x, _⟩ => ⟨x⟩⟩
#align set.nonempty_iff_univ_nonempty Set.nonempty_iff_univ_nonempty
@[simp]
theorem univ_nonempty : ∀ [Nonempty α], (univ : Set α).Nonempty
| ⟨x⟩ => ⟨x, trivial⟩
#align set.univ_nonempty Set.univ_nonempty
theorem Nonempty.to_subtype : s.Nonempty → Nonempty (↥s) :=
nonempty_subtype.2
#align set.nonempty.to_subtype Set.Nonempty.to_subtype
theorem Nonempty.to_type : s.Nonempty → Nonempty α := fun ⟨x, _⟩ => ⟨x⟩
#align set.nonempty.to_type Set.Nonempty.to_type
instance univ.nonempty [Nonempty α] : Nonempty (↥(Set.univ : Set α)) :=
Set.univ_nonempty.to_subtype
#align set.univ.nonempty Set.univ.nonempty
theorem nonempty_of_nonempty_subtype [Nonempty (↥s)] : s.Nonempty :=
nonempty_subtype.mp ‹_›
#align set.nonempty_of_nonempty_subtype Set.nonempty_of_nonempty_subtype
theorem empty_def : (∅ : Set α) = { _x : α | False } :=
rfl
#align set.empty_def Set.empty_def
@[simp]
theorem mem_empty_iff_false (x : α) : x ∈ (∅ : Set α) ↔ False :=
Iff.rfl
#align set.mem_empty_iff_false Set.mem_empty_iff_false
@[simp]
theorem setOf_false : { _a : α | False } = ∅ :=
rfl
#align set.set_of_false Set.setOf_false
@[simp] theorem setOf_bot : { _x : α | ⊥ } = ∅ := rfl
@[simp]
theorem empty_subset (s : Set α) : ∅ ⊆ s :=
nofun
#align set.empty_subset Set.empty_subset
theorem subset_empty_iff {s : Set α} : s ⊆ ∅ ↔ s = ∅ :=
(Subset.antisymm_iff.trans <| and_iff_left (empty_subset _)).symm
#align set.subset_empty_iff Set.subset_empty_iff
theorem eq_empty_iff_forall_not_mem {s : Set α} : s = ∅ ↔ ∀ x, x ∉ s :=
subset_empty_iff.symm
#align set.eq_empty_iff_forall_not_mem Set.eq_empty_iff_forall_not_mem
theorem eq_empty_of_forall_not_mem (h : ∀ x, x ∉ s) : s = ∅ :=
subset_empty_iff.1 h
#align set.eq_empty_of_forall_not_mem Set.eq_empty_of_forall_not_mem
theorem eq_empty_of_subset_empty {s : Set α} : s ⊆ ∅ → s = ∅ :=
subset_empty_iff.1
#align set.eq_empty_of_subset_empty Set.eq_empty_of_subset_empty
theorem eq_empty_of_isEmpty [IsEmpty α] (s : Set α) : s = ∅ :=
eq_empty_of_subset_empty fun x _ => isEmptyElim x
#align set.eq_empty_of_is_empty Set.eq_empty_of_isEmpty
instance uniqueEmpty [IsEmpty α] : Unique (Set α) where
default := ∅
uniq := eq_empty_of_isEmpty
#align set.unique_empty Set.uniqueEmpty
theorem not_nonempty_iff_eq_empty {s : Set α} : ¬s.Nonempty ↔ s = ∅ := by
simp only [Set.Nonempty, not_exists, eq_empty_iff_forall_not_mem]
#align set.not_nonempty_iff_eq_empty Set.not_nonempty_iff_eq_empty
theorem nonempty_iff_ne_empty : s.Nonempty ↔ s ≠ ∅ :=
not_nonempty_iff_eq_empty.not_right
#align set.nonempty_iff_ne_empty Set.nonempty_iff_ne_empty
theorem not_nonempty_iff_eq_empty' : ¬Nonempty s ↔ s = ∅ := by
rw [nonempty_subtype, not_exists, eq_empty_iff_forall_not_mem]
theorem nonempty_iff_ne_empty' : Nonempty s ↔ s ≠ ∅ :=
not_nonempty_iff_eq_empty'.not_right
alias ⟨Nonempty.ne_empty, _⟩ := nonempty_iff_ne_empty
#align set.nonempty.ne_empty Set.Nonempty.ne_empty
@[simp]
theorem not_nonempty_empty : ¬(∅ : Set α).Nonempty := fun ⟨_, hx⟩ => hx
#align set.not_nonempty_empty Set.not_nonempty_empty
-- Porting note: removing `@[simp]` as it is competing with `isEmpty_subtype`.
-- @[simp]
theorem isEmpty_coe_sort {s : Set α} : IsEmpty (↥s) ↔ s = ∅ :=
not_iff_not.1 <| by simpa using nonempty_iff_ne_empty
#align set.is_empty_coe_sort Set.isEmpty_coe_sort
theorem eq_empty_or_nonempty (s : Set α) : s = ∅ ∨ s.Nonempty :=
or_iff_not_imp_left.2 nonempty_iff_ne_empty.2
#align set.eq_empty_or_nonempty Set.eq_empty_or_nonempty
theorem subset_eq_empty {s t : Set α} (h : t ⊆ s) (e : s = ∅) : t = ∅ :=
subset_empty_iff.1 <| e ▸ h
#align set.subset_eq_empty Set.subset_eq_empty
theorem forall_mem_empty {p : α → Prop} : (∀ x ∈ (∅ : Set α), p x) ↔ True :=
iff_true_intro fun _ => False.elim
#align set.ball_empty_iff Set.forall_mem_empty
@[deprecated (since := "2024-03-23")] alias ball_empty_iff := forall_mem_empty
instance (α : Type u) : IsEmpty.{u + 1} (↥(∅ : Set α)) :=
⟨fun x => x.2⟩
@[simp]
theorem empty_ssubset : ∅ ⊂ s ↔ s.Nonempty :=
(@bot_lt_iff_ne_bot (Set α) _ _ _).trans nonempty_iff_ne_empty.symm
#align set.empty_ssubset Set.empty_ssubset
alias ⟨_, Nonempty.empty_ssubset⟩ := empty_ssubset
#align set.nonempty.empty_ssubset Set.Nonempty.empty_ssubset
@[simp]
theorem setOf_true : { _x : α | True } = univ :=
rfl
#align set.set_of_true Set.setOf_true
@[simp] theorem setOf_top : { _x : α | ⊤ } = univ := rfl
@[simp]
theorem univ_eq_empty_iff : (univ : Set α) = ∅ ↔ IsEmpty α :=
eq_empty_iff_forall_not_mem.trans
⟨fun H => ⟨fun x => H x trivial⟩, fun H x _ => @IsEmpty.false α H x⟩
#align set.univ_eq_empty_iff Set.univ_eq_empty_iff
theorem empty_ne_univ [Nonempty α] : (∅ : Set α) ≠ univ := fun e =>
not_isEmpty_of_nonempty α <| univ_eq_empty_iff.1 e.symm
#align set.empty_ne_univ Set.empty_ne_univ
@[simp]
theorem subset_univ (s : Set α) : s ⊆ univ := fun _ _ => trivial
#align set.subset_univ Set.subset_univ
@[simp]
theorem univ_subset_iff {s : Set α} : univ ⊆ s ↔ s = univ :=
@top_le_iff _ _ _ s
#align set.univ_subset_iff Set.univ_subset_iff
alias ⟨eq_univ_of_univ_subset, _⟩ := univ_subset_iff
#align set.eq_univ_of_univ_subset Set.eq_univ_of_univ_subset
theorem eq_univ_iff_forall {s : Set α} : s = univ ↔ ∀ x, x ∈ s :=
univ_subset_iff.symm.trans <| forall_congr' fun _ => imp_iff_right trivial
#align set.eq_univ_iff_forall Set.eq_univ_iff_forall
theorem eq_univ_of_forall {s : Set α} : (∀ x, x ∈ s) → s = univ :=
eq_univ_iff_forall.2
#align set.eq_univ_of_forall Set.eq_univ_of_forall
theorem Nonempty.eq_univ [Subsingleton α] : s.Nonempty → s = univ := by
rintro ⟨x, hx⟩
exact eq_univ_of_forall fun y => by rwa [Subsingleton.elim y x]
#align set.nonempty.eq_univ Set.Nonempty.eq_univ
theorem eq_univ_of_subset {s t : Set α} (h : s ⊆ t) (hs : s = univ) : t = univ :=
eq_univ_of_univ_subset <| (hs ▸ h : univ ⊆ t)
#align set.eq_univ_of_subset Set.eq_univ_of_subset
theorem exists_mem_of_nonempty (α) : ∀ [Nonempty α], ∃ x : α, x ∈ (univ : Set α)
| ⟨x⟩ => ⟨x, trivial⟩
#align set.exists_mem_of_nonempty Set.exists_mem_of_nonempty
theorem ne_univ_iff_exists_not_mem {α : Type*} (s : Set α) : s ≠ univ ↔ ∃ a, a ∉ s := by
rw [← not_forall, ← eq_univ_iff_forall]
#align set.ne_univ_iff_exists_not_mem Set.ne_univ_iff_exists_not_mem
theorem not_subset_iff_exists_mem_not_mem {α : Type*} {s t : Set α} :
¬s ⊆ t ↔ ∃ x, x ∈ s ∧ x ∉ t := by simp [subset_def]
#align set.not_subset_iff_exists_mem_not_mem Set.not_subset_iff_exists_mem_not_mem
theorem univ_unique [Unique α] : @Set.univ α = {default} :=
Set.ext fun x => iff_of_true trivial <| Subsingleton.elim x default
#align set.univ_unique Set.univ_unique
theorem ssubset_univ_iff : s ⊂ univ ↔ s ≠ univ :=
lt_top_iff_ne_top
#align set.ssubset_univ_iff Set.ssubset_univ_iff
instance nontrivial_of_nonempty [Nonempty α] : Nontrivial (Set α) :=
⟨⟨∅, univ, empty_ne_univ⟩⟩
#align set.nontrivial_of_nonempty Set.nontrivial_of_nonempty
theorem union_def {s₁ s₂ : Set α} : s₁ ∪ s₂ = { a | a ∈ s₁ ∨ a ∈ s₂ } :=
rfl
#align set.union_def Set.union_def
theorem mem_union_left {x : α} {a : Set α} (b : Set α) : x ∈ a → x ∈ a ∪ b :=
Or.inl
#align set.mem_union_left Set.mem_union_left
theorem mem_union_right {x : α} {b : Set α} (a : Set α) : x ∈ b → x ∈ a ∪ b :=
Or.inr
#align set.mem_union_right Set.mem_union_right
theorem mem_or_mem_of_mem_union {x : α} {a b : Set α} (H : x ∈ a ∪ b) : x ∈ a ∨ x ∈ b :=
H
#align set.mem_or_mem_of_mem_union Set.mem_or_mem_of_mem_union
theorem MemUnion.elim {x : α} {a b : Set α} {P : Prop} (H₁ : x ∈ a ∪ b) (H₂ : x ∈ a → P)
(H₃ : x ∈ b → P) : P :=
Or.elim H₁ H₂ H₃
#align set.mem_union.elim Set.MemUnion.elim
@[simp]
theorem mem_union (x : α) (a b : Set α) : x ∈ a ∪ b ↔ x ∈ a ∨ x ∈ b :=
Iff.rfl
#align set.mem_union Set.mem_union
@[simp]
theorem union_self (a : Set α) : a ∪ a = a :=
ext fun _ => or_self_iff
#align set.union_self Set.union_self
@[simp]
theorem union_empty (a : Set α) : a ∪ ∅ = a :=
ext fun _ => or_false_iff _
#align set.union_empty Set.union_empty
@[simp]
theorem empty_union (a : Set α) : ∅ ∪ a = a :=
ext fun _ => false_or_iff _
#align set.empty_union Set.empty_union
theorem union_comm (a b : Set α) : a ∪ b = b ∪ a :=
ext fun _ => or_comm
#align set.union_comm Set.union_comm
theorem union_assoc (a b c : Set α) : a ∪ b ∪ c = a ∪ (b ∪ c) :=
ext fun _ => or_assoc
#align set.union_assoc Set.union_assoc
instance union_isAssoc : Std.Associative (α := Set α) (· ∪ ·) :=
⟨union_assoc⟩
#align set.union_is_assoc Set.union_isAssoc
instance union_isComm : Std.Commutative (α := Set α) (· ∪ ·) :=
⟨union_comm⟩
#align set.union_is_comm Set.union_isComm
theorem union_left_comm (s₁ s₂ s₃ : Set α) : s₁ ∪ (s₂ ∪ s₃) = s₂ ∪ (s₁ ∪ s₃) :=
ext fun _ => or_left_comm
#align set.union_left_comm Set.union_left_comm
theorem union_right_comm (s₁ s₂ s₃ : Set α) : s₁ ∪ s₂ ∪ s₃ = s₁ ∪ s₃ ∪ s₂ :=
ext fun _ => or_right_comm
#align set.union_right_comm Set.union_right_comm
@[simp]
theorem union_eq_left {s t : Set α} : s ∪ t = s ↔ t ⊆ s :=
sup_eq_left
#align set.union_eq_left_iff_subset Set.union_eq_left
@[simp]
theorem union_eq_right {s t : Set α} : s ∪ t = t ↔ s ⊆ t :=
sup_eq_right
#align set.union_eq_right_iff_subset Set.union_eq_right
theorem union_eq_self_of_subset_left {s t : Set α} (h : s ⊆ t) : s ∪ t = t :=
union_eq_right.mpr h
#align set.union_eq_self_of_subset_left Set.union_eq_self_of_subset_left
theorem union_eq_self_of_subset_right {s t : Set α} (h : t ⊆ s) : s ∪ t = s :=
union_eq_left.mpr h
#align set.union_eq_self_of_subset_right Set.union_eq_self_of_subset_right
@[simp]
theorem subset_union_left {s t : Set α} : s ⊆ s ∪ t := fun _ => Or.inl
#align set.subset_union_left Set.subset_union_left
@[simp]
theorem subset_union_right {s t : Set α} : t ⊆ s ∪ t := fun _ => Or.inr
#align set.subset_union_right Set.subset_union_right
theorem union_subset {s t r : Set α} (sr : s ⊆ r) (tr : t ⊆ r) : s ∪ t ⊆ r := fun _ =>
Or.rec (@sr _) (@tr _)
#align set.union_subset Set.union_subset
@[simp]
theorem union_subset_iff {s t u : Set α} : s ∪ t ⊆ u ↔ s ⊆ u ∧ t ⊆ u :=
(forall_congr' fun _ => or_imp).trans forall_and
#align set.union_subset_iff Set.union_subset_iff
@[gcongr]
theorem union_subset_union {s₁ s₂ t₁ t₂ : Set α} (h₁ : s₁ ⊆ s₂) (h₂ : t₁ ⊆ t₂) :
s₁ ∪ t₁ ⊆ s₂ ∪ t₂ := fun _ => Or.imp (@h₁ _) (@h₂ _)
#align set.union_subset_union Set.union_subset_union
@[gcongr]
theorem union_subset_union_left {s₁ s₂ : Set α} (t) (h : s₁ ⊆ s₂) : s₁ ∪ t ⊆ s₂ ∪ t :=
union_subset_union h Subset.rfl
#align set.union_subset_union_left Set.union_subset_union_left
@[gcongr]
theorem union_subset_union_right (s) {t₁ t₂ : Set α} (h : t₁ ⊆ t₂) : s ∪ t₁ ⊆ s ∪ t₂ :=
union_subset_union Subset.rfl h
#align set.union_subset_union_right Set.union_subset_union_right
theorem subset_union_of_subset_left {s t : Set α} (h : s ⊆ t) (u : Set α) : s ⊆ t ∪ u :=
h.trans subset_union_left
#align set.subset_union_of_subset_left Set.subset_union_of_subset_left
theorem subset_union_of_subset_right {s u : Set α} (h : s ⊆ u) (t : Set α) : s ⊆ t ∪ u :=
h.trans subset_union_right
#align set.subset_union_of_subset_right Set.subset_union_of_subset_right
-- Porting note: replaced `⊔` in RHS
theorem union_congr_left (ht : t ⊆ s ∪ u) (hu : u ⊆ s ∪ t) : s ∪ t = s ∪ u :=
sup_congr_left ht hu
#align set.union_congr_left Set.union_congr_left
theorem union_congr_right (hs : s ⊆ t ∪ u) (ht : t ⊆ s ∪ u) : s ∪ u = t ∪ u :=
sup_congr_right hs ht
#align set.union_congr_right Set.union_congr_right
theorem union_eq_union_iff_left : s ∪ t = s ∪ u ↔ t ⊆ s ∪ u ∧ u ⊆ s ∪ t :=
sup_eq_sup_iff_left
#align set.union_eq_union_iff_left Set.union_eq_union_iff_left
theorem union_eq_union_iff_right : s ∪ u = t ∪ u ↔ s ⊆ t ∪ u ∧ t ⊆ s ∪ u :=
sup_eq_sup_iff_right
#align set.union_eq_union_iff_right Set.union_eq_union_iff_right
@[simp]
theorem union_empty_iff {s t : Set α} : s ∪ t = ∅ ↔ s = ∅ ∧ t = ∅ := by
simp only [← subset_empty_iff]
exact union_subset_iff
#align set.union_empty_iff Set.union_empty_iff
@[simp]
theorem union_univ (s : Set α) : s ∪ univ = univ := sup_top_eq _
#align set.union_univ Set.union_univ
@[simp]
theorem univ_union (s : Set α) : univ ∪ s = univ := top_sup_eq _
#align set.univ_union Set.univ_union
theorem inter_def {s₁ s₂ : Set α} : s₁ ∩ s₂ = { a | a ∈ s₁ ∧ a ∈ s₂ } :=
rfl
#align set.inter_def Set.inter_def
@[simp, mfld_simps]
theorem mem_inter_iff (x : α) (a b : Set α) : x ∈ a ∩ b ↔ x ∈ a ∧ x ∈ b :=
Iff.rfl
#align set.mem_inter_iff Set.mem_inter_iff
theorem mem_inter {x : α} {a b : Set α} (ha : x ∈ a) (hb : x ∈ b) : x ∈ a ∩ b :=
⟨ha, hb⟩
#align set.mem_inter Set.mem_inter
theorem mem_of_mem_inter_left {x : α} {a b : Set α} (h : x ∈ a ∩ b) : x ∈ a :=
h.left
#align set.mem_of_mem_inter_left Set.mem_of_mem_inter_left
theorem mem_of_mem_inter_right {x : α} {a b : Set α} (h : x ∈ a ∩ b) : x ∈ b :=
h.right
#align set.mem_of_mem_inter_right Set.mem_of_mem_inter_right
@[simp]
theorem inter_self (a : Set α) : a ∩ a = a :=
ext fun _ => and_self_iff
#align set.inter_self Set.inter_self
@[simp]
theorem inter_empty (a : Set α) : a ∩ ∅ = ∅ :=
ext fun _ => and_false_iff _
#align set.inter_empty Set.inter_empty
@[simp]
theorem empty_inter (a : Set α) : ∅ ∩ a = ∅ :=
ext fun _ => false_and_iff _
#align set.empty_inter Set.empty_inter
theorem inter_comm (a b : Set α) : a ∩ b = b ∩ a :=
ext fun _ => and_comm
#align set.inter_comm Set.inter_comm
theorem inter_assoc (a b c : Set α) : a ∩ b ∩ c = a ∩ (b ∩ c) :=
ext fun _ => and_assoc
#align set.inter_assoc Set.inter_assoc
instance inter_isAssoc : Std.Associative (α := Set α) (· ∩ ·) :=
⟨inter_assoc⟩
#align set.inter_is_assoc Set.inter_isAssoc
instance inter_isComm : Std.Commutative (α := Set α) (· ∩ ·) :=
⟨inter_comm⟩
#align set.inter_is_comm Set.inter_isComm
theorem inter_left_comm (s₁ s₂ s₃ : Set α) : s₁ ∩ (s₂ ∩ s₃) = s₂ ∩ (s₁ ∩ s₃) :=
ext fun _ => and_left_comm
#align set.inter_left_comm Set.inter_left_comm
theorem inter_right_comm (s₁ s₂ s₃ : Set α) : s₁ ∩ s₂ ∩ s₃ = s₁ ∩ s₃ ∩ s₂ :=
ext fun _ => and_right_comm
#align set.inter_right_comm Set.inter_right_comm
@[simp, mfld_simps]
theorem inter_subset_left {s t : Set α} : s ∩ t ⊆ s := fun _ => And.left
#align set.inter_subset_left Set.inter_subset_left
@[simp]
theorem inter_subset_right {s t : Set α} : s ∩ t ⊆ t := fun _ => And.right
#align set.inter_subset_right Set.inter_subset_right
theorem subset_inter {s t r : Set α} (rs : r ⊆ s) (rt : r ⊆ t) : r ⊆ s ∩ t := fun _ h =>
⟨rs h, rt h⟩
#align set.subset_inter Set.subset_inter
@[simp]
theorem subset_inter_iff {s t r : Set α} : r ⊆ s ∩ t ↔ r ⊆ s ∧ r ⊆ t :=
(forall_congr' fun _ => imp_and).trans forall_and
#align set.subset_inter_iff Set.subset_inter_iff
@[simp] lemma inter_eq_left : s ∩ t = s ↔ s ⊆ t := inf_eq_left
#align set.inter_eq_left_iff_subset Set.inter_eq_left
@[simp] lemma inter_eq_right : s ∩ t = t ↔ t ⊆ s := inf_eq_right
#align set.inter_eq_right_iff_subset Set.inter_eq_right
@[simp] lemma left_eq_inter : s = s ∩ t ↔ s ⊆ t := left_eq_inf
@[simp] lemma right_eq_inter : t = s ∩ t ↔ t ⊆ s := right_eq_inf
theorem inter_eq_self_of_subset_left {s t : Set α} : s ⊆ t → s ∩ t = s :=
inter_eq_left.mpr
#align set.inter_eq_self_of_subset_left Set.inter_eq_self_of_subset_left
theorem inter_eq_self_of_subset_right {s t : Set α} : t ⊆ s → s ∩ t = t :=
inter_eq_right.mpr
#align set.inter_eq_self_of_subset_right Set.inter_eq_self_of_subset_right
theorem inter_congr_left (ht : s ∩ u ⊆ t) (hu : s ∩ t ⊆ u) : s ∩ t = s ∩ u :=
inf_congr_left ht hu
#align set.inter_congr_left Set.inter_congr_left
theorem inter_congr_right (hs : t ∩ u ⊆ s) (ht : s ∩ u ⊆ t) : s ∩ u = t ∩ u :=
inf_congr_right hs ht
#align set.inter_congr_right Set.inter_congr_right
theorem inter_eq_inter_iff_left : s ∩ t = s ∩ u ↔ s ∩ u ⊆ t ∧ s ∩ t ⊆ u :=
inf_eq_inf_iff_left
#align set.inter_eq_inter_iff_left Set.inter_eq_inter_iff_left
theorem inter_eq_inter_iff_right : s ∩ u = t ∩ u ↔ t ∩ u ⊆ s ∧ s ∩ u ⊆ t :=
inf_eq_inf_iff_right
#align set.inter_eq_inter_iff_right Set.inter_eq_inter_iff_right
@[simp, mfld_simps]
theorem inter_univ (a : Set α) : a ∩ univ = a := inf_top_eq _
#align set.inter_univ Set.inter_univ
@[simp, mfld_simps]
theorem univ_inter (a : Set α) : univ ∩ a = a := top_inf_eq _
#align set.univ_inter Set.univ_inter
@[gcongr]
theorem inter_subset_inter {s₁ s₂ t₁ t₂ : Set α} (h₁ : s₁ ⊆ t₁) (h₂ : s₂ ⊆ t₂) :
s₁ ∩ s₂ ⊆ t₁ ∩ t₂ := fun _ => And.imp (@h₁ _) (@h₂ _)
#align set.inter_subset_inter Set.inter_subset_inter
@[gcongr]
theorem inter_subset_inter_left {s t : Set α} (u : Set α) (H : s ⊆ t) : s ∩ u ⊆ t ∩ u :=
inter_subset_inter H Subset.rfl
#align set.inter_subset_inter_left Set.inter_subset_inter_left
@[gcongr]
theorem inter_subset_inter_right {s t : Set α} (u : Set α) (H : s ⊆ t) : u ∩ s ⊆ u ∩ t :=
inter_subset_inter Subset.rfl H
#align set.inter_subset_inter_right Set.inter_subset_inter_right
theorem union_inter_cancel_left {s t : Set α} : (s ∪ t) ∩ s = s :=
inter_eq_self_of_subset_right subset_union_left
#align set.union_inter_cancel_left Set.union_inter_cancel_left
theorem union_inter_cancel_right {s t : Set α} : (s ∪ t) ∩ t = t :=
inter_eq_self_of_subset_right subset_union_right
#align set.union_inter_cancel_right Set.union_inter_cancel_right
theorem inter_setOf_eq_sep (s : Set α) (p : α → Prop) : s ∩ {a | p a} = {a ∈ s | p a} :=
rfl
#align set.inter_set_of_eq_sep Set.inter_setOf_eq_sep
theorem setOf_inter_eq_sep (p : α → Prop) (s : Set α) : {a | p a} ∩ s = {a ∈ s | p a} :=
inter_comm _ _
#align set.set_of_inter_eq_sep Set.setOf_inter_eq_sep
theorem inter_union_distrib_left (s t u : Set α) : s ∩ (t ∪ u) = s ∩ t ∪ s ∩ u :=
inf_sup_left _ _ _
#align set.inter_distrib_left Set.inter_union_distrib_left
theorem union_inter_distrib_right (s t u : Set α) : (s ∪ t) ∩ u = s ∩ u ∪ t ∩ u :=
inf_sup_right _ _ _
#align set.inter_distrib_right Set.union_inter_distrib_right
theorem union_inter_distrib_left (s t u : Set α) : s ∪ t ∩ u = (s ∪ t) ∩ (s ∪ u) :=
sup_inf_left _ _ _
#align set.union_distrib_left Set.union_inter_distrib_left
theorem inter_union_distrib_right (s t u : Set α) : s ∩ t ∪ u = (s ∪ u) ∩ (t ∪ u) :=
sup_inf_right _ _ _
#align set.union_distrib_right Set.inter_union_distrib_right
-- 2024-03-22
@[deprecated] alias inter_distrib_left := inter_union_distrib_left
@[deprecated] alias inter_distrib_right := union_inter_distrib_right
@[deprecated] alias union_distrib_left := union_inter_distrib_left
@[deprecated] alias union_distrib_right := inter_union_distrib_right
theorem union_union_distrib_left (s t u : Set α) : s ∪ (t ∪ u) = s ∪ t ∪ (s ∪ u) :=
sup_sup_distrib_left _ _ _
#align set.union_union_distrib_left Set.union_union_distrib_left
theorem union_union_distrib_right (s t u : Set α) : s ∪ t ∪ u = s ∪ u ∪ (t ∪ u) :=
sup_sup_distrib_right _ _ _
#align set.union_union_distrib_right Set.union_union_distrib_right
theorem inter_inter_distrib_left (s t u : Set α) : s ∩ (t ∩ u) = s ∩ t ∩ (s ∩ u) :=
inf_inf_distrib_left _ _ _
#align set.inter_inter_distrib_left Set.inter_inter_distrib_left
theorem inter_inter_distrib_right (s t u : Set α) : s ∩ t ∩ u = s ∩ u ∩ (t ∩ u) :=
inf_inf_distrib_right _ _ _
#align set.inter_inter_distrib_right Set.inter_inter_distrib_right
theorem union_union_union_comm (s t u v : Set α) : s ∪ t ∪ (u ∪ v) = s ∪ u ∪ (t ∪ v) :=
sup_sup_sup_comm _ _ _ _
#align set.union_union_union_comm Set.union_union_union_comm
theorem inter_inter_inter_comm (s t u v : Set α) : s ∩ t ∩ (u ∩ v) = s ∩ u ∩ (t ∩ v) :=
inf_inf_inf_comm _ _ _ _
#align set.inter_inter_inter_comm Set.inter_inter_inter_comm
theorem insert_def (x : α) (s : Set α) : insert x s = { y | y = x ∨ y ∈ s } :=
rfl
#align set.insert_def Set.insert_def
@[simp]
theorem subset_insert (x : α) (s : Set α) : s ⊆ insert x s := fun _ => Or.inr
#align set.subset_insert Set.subset_insert
theorem mem_insert (x : α) (s : Set α) : x ∈ insert x s :=
Or.inl rfl
#align set.mem_insert Set.mem_insert
theorem mem_insert_of_mem {x : α} {s : Set α} (y : α) : x ∈ s → x ∈ insert y s :=
Or.inr
#align set.mem_insert_of_mem Set.mem_insert_of_mem
theorem eq_or_mem_of_mem_insert {x a : α} {s : Set α} : x ∈ insert a s → x = a ∨ x ∈ s :=
id
#align set.eq_or_mem_of_mem_insert Set.eq_or_mem_of_mem_insert
theorem mem_of_mem_insert_of_ne : b ∈ insert a s → b ≠ a → b ∈ s :=
Or.resolve_left
#align set.mem_of_mem_insert_of_ne Set.mem_of_mem_insert_of_ne
theorem eq_of_not_mem_of_mem_insert : b ∈ insert a s → b ∉ s → b = a :=
Or.resolve_right
#align set.eq_of_not_mem_of_mem_insert Set.eq_of_not_mem_of_mem_insert
@[simp]
theorem mem_insert_iff {x a : α} {s : Set α} : x ∈ insert a s ↔ x = a ∨ x ∈ s :=
Iff.rfl
#align set.mem_insert_iff Set.mem_insert_iff
@[simp]
theorem insert_eq_of_mem {a : α} {s : Set α} (h : a ∈ s) : insert a s = s :=
ext fun _ => or_iff_right_of_imp fun e => e.symm ▸ h
#align set.insert_eq_of_mem Set.insert_eq_of_mem
theorem ne_insert_of_not_mem {s : Set α} (t : Set α) {a : α} : a ∉ s → s ≠ insert a t :=
mt fun e => e.symm ▸ mem_insert _ _
#align set.ne_insert_of_not_mem Set.ne_insert_of_not_mem
@[simp]
theorem insert_eq_self : insert a s = s ↔ a ∈ s :=
⟨fun h => h ▸ mem_insert _ _, insert_eq_of_mem⟩
#align set.insert_eq_self Set.insert_eq_self
theorem insert_ne_self : insert a s ≠ s ↔ a ∉ s :=
insert_eq_self.not
#align set.insert_ne_self Set.insert_ne_self
theorem insert_subset_iff : insert a s ⊆ t ↔ a ∈ t ∧ s ⊆ t := by
simp only [subset_def, mem_insert_iff, or_imp, forall_and, forall_eq]
#align set.insert_subset Set.insert_subset_iff
theorem insert_subset (ha : a ∈ t) (hs : s ⊆ t) : insert a s ⊆ t :=
insert_subset_iff.mpr ⟨ha, hs⟩
theorem insert_subset_insert (h : s ⊆ t) : insert a s ⊆ insert a t := fun _ => Or.imp_right (@h _)
#align set.insert_subset_insert Set.insert_subset_insert
@[simp] theorem insert_subset_insert_iff (ha : a ∉ s) : insert a s ⊆ insert a t ↔ s ⊆ t := by
refine ⟨fun h x hx => ?_, insert_subset_insert⟩
rcases h (subset_insert _ _ hx) with (rfl | hxt)
exacts [(ha hx).elim, hxt]
#align set.insert_subset_insert_iff Set.insert_subset_insert_iff
theorem subset_insert_iff_of_not_mem (ha : a ∉ s) : s ⊆ insert a t ↔ s ⊆ t :=
forall₂_congr fun _ hb => or_iff_right <| ne_of_mem_of_not_mem hb ha
#align set.subset_insert_iff_of_not_mem Set.subset_insert_iff_of_not_mem
theorem ssubset_iff_insert {s t : Set α} : s ⊂ t ↔ ∃ a ∉ s, insert a s ⊆ t := by
simp only [insert_subset_iff, exists_and_right, ssubset_def, not_subset]
aesop
#align set.ssubset_iff_insert Set.ssubset_iff_insert
theorem ssubset_insert {s : Set α} {a : α} (h : a ∉ s) : s ⊂ insert a s :=
ssubset_iff_insert.2 ⟨a, h, Subset.rfl⟩
#align set.ssubset_insert Set.ssubset_insert
theorem insert_comm (a b : α) (s : Set α) : insert a (insert b s) = insert b (insert a s) :=
ext fun _ => or_left_comm
#align set.insert_comm Set.insert_comm
-- Porting note (#10618): removing `simp` attribute because `simp` can prove it
theorem insert_idem (a : α) (s : Set α) : insert a (insert a s) = insert a s :=
insert_eq_of_mem <| mem_insert _ _
#align set.insert_idem Set.insert_idem
theorem insert_union : insert a s ∪ t = insert a (s ∪ t) :=
ext fun _ => or_assoc
#align set.insert_union Set.insert_union
@[simp]
theorem union_insert : s ∪ insert a t = insert a (s ∪ t) :=
ext fun _ => or_left_comm
#align set.union_insert Set.union_insert
@[simp]
theorem insert_nonempty (a : α) (s : Set α) : (insert a s).Nonempty :=
⟨a, mem_insert a s⟩
#align set.insert_nonempty Set.insert_nonempty
instance (a : α) (s : Set α) : Nonempty (insert a s : Set α) :=
(insert_nonempty a s).to_subtype
theorem insert_inter_distrib (a : α) (s t : Set α) : insert a (s ∩ t) = insert a s ∩ insert a t :=
ext fun _ => or_and_left
#align set.insert_inter_distrib Set.insert_inter_distrib
theorem insert_union_distrib (a : α) (s t : Set α) : insert a (s ∪ t) = insert a s ∪ insert a t :=
ext fun _ => or_or_distrib_left
#align set.insert_union_distrib Set.insert_union_distrib
theorem insert_inj (ha : a ∉ s) : insert a s = insert b s ↔ a = b :=
⟨fun h => eq_of_not_mem_of_mem_insert (h.subst <| mem_insert a s) ha,
congr_arg (fun x => insert x s)⟩
#align set.insert_inj Set.insert_inj
-- useful in proofs by induction
theorem forall_of_forall_insert {P : α → Prop} {a : α} {s : Set α} (H : ∀ x, x ∈ insert a s → P x)
(x) (h : x ∈ s) : P x :=
H _ (Or.inr h)
#align set.forall_of_forall_insert Set.forall_of_forall_insert
theorem forall_insert_of_forall {P : α → Prop} {a : α} {s : Set α} (H : ∀ x, x ∈ s → P x) (ha : P a)
(x) (h : x ∈ insert a s) : P x :=
h.elim (fun e => e.symm ▸ ha) (H _)
#align set.forall_insert_of_forall Set.forall_insert_of_forall
theorem exists_mem_insert {P : α → Prop} {a : α} {s : Set α} :
(∃ x ∈ insert a s, P x) ↔ (P a ∨ ∃ x ∈ s, P x) := by
simp [mem_insert_iff, or_and_right, exists_and_left, exists_or]
#align set.bex_insert_iff Set.exists_mem_insert
@[deprecated (since := "2024-03-23")] alias bex_insert_iff := exists_mem_insert
theorem forall_mem_insert {P : α → Prop} {a : α} {s : Set α} :
(∀ x ∈ insert a s, P x) ↔ P a ∧ ∀ x ∈ s, P x :=
forall₂_or_left.trans <| and_congr_left' forall_eq
#align set.ball_insert_iff Set.forall_mem_insert
@[deprecated (since := "2024-03-23")] alias ball_insert_iff := forall_mem_insert
instance : LawfulSingleton α (Set α) :=
⟨fun x => Set.ext fun a => by
simp only [mem_empty_iff_false, mem_insert_iff, or_false]
exact Iff.rfl⟩
theorem singleton_def (a : α) : ({a} : Set α) = insert a ∅ :=
(insert_emptyc_eq a).symm
#align set.singleton_def Set.singleton_def
@[simp]
theorem mem_singleton_iff {a b : α} : a ∈ ({b} : Set α) ↔ a = b :=
Iff.rfl
#align set.mem_singleton_iff Set.mem_singleton_iff
@[simp]
theorem setOf_eq_eq_singleton {a : α} : { n | n = a } = {a} :=
rfl
#align set.set_of_eq_eq_singleton Set.setOf_eq_eq_singleton
@[simp]
theorem setOf_eq_eq_singleton' {a : α} : { x | a = x } = {a} :=
ext fun _ => eq_comm
#align set.set_of_eq_eq_singleton' Set.setOf_eq_eq_singleton'
-- TODO: again, annotation needed
--Porting note (#11119): removed `simp` attribute
theorem mem_singleton (a : α) : a ∈ ({a} : Set α) :=
@rfl _ _
#align set.mem_singleton Set.mem_singleton
theorem eq_of_mem_singleton {x y : α} (h : x ∈ ({y} : Set α)) : x = y :=
h
#align set.eq_of_mem_singleton Set.eq_of_mem_singleton
@[simp]
theorem singleton_eq_singleton_iff {x y : α} : {x} = ({y} : Set α) ↔ x = y :=
ext_iff.trans eq_iff_eq_cancel_left
#align set.singleton_eq_singleton_iff Set.singleton_eq_singleton_iff
theorem singleton_injective : Injective (singleton : α → Set α) := fun _ _ =>
singleton_eq_singleton_iff.mp
#align set.singleton_injective Set.singleton_injective
theorem mem_singleton_of_eq {x y : α} (H : x = y) : x ∈ ({y} : Set α) :=
H
#align set.mem_singleton_of_eq Set.mem_singleton_of_eq
theorem insert_eq (x : α) (s : Set α) : insert x s = ({x} : Set α) ∪ s :=
rfl
#align set.insert_eq Set.insert_eq
@[simp]
theorem singleton_nonempty (a : α) : ({a} : Set α).Nonempty :=
⟨a, rfl⟩
#align set.singleton_nonempty Set.singleton_nonempty
@[simp]
theorem singleton_ne_empty (a : α) : ({a} : Set α) ≠ ∅ :=
(singleton_nonempty _).ne_empty
#align set.singleton_ne_empty Set.singleton_ne_empty
--Porting note (#10618): removed `simp` attribute because `simp` can prove it
theorem empty_ssubset_singleton : (∅ : Set α) ⊂ {a} :=
(singleton_nonempty _).empty_ssubset
#align set.empty_ssubset_singleton Set.empty_ssubset_singleton
@[simp]
theorem singleton_subset_iff {a : α} {s : Set α} : {a} ⊆ s ↔ a ∈ s :=
forall_eq
#align set.singleton_subset_iff Set.singleton_subset_iff
theorem singleton_subset_singleton : ({a} : Set α) ⊆ {b} ↔ a = b := by simp
#align set.singleton_subset_singleton Set.singleton_subset_singleton
theorem set_compr_eq_eq_singleton {a : α} : { b | b = a } = {a} :=
rfl
#align set.set_compr_eq_eq_singleton Set.set_compr_eq_eq_singleton
@[simp]
theorem singleton_union : {a} ∪ s = insert a s :=
rfl
#align set.singleton_union Set.singleton_union
@[simp]
theorem union_singleton : s ∪ {a} = insert a s :=
union_comm _ _
#align set.union_singleton Set.union_singleton
@[simp]
theorem singleton_inter_nonempty : ({a} ∩ s).Nonempty ↔ a ∈ s := by
simp only [Set.Nonempty, mem_inter_iff, mem_singleton_iff, exists_eq_left]
#align set.singleton_inter_nonempty Set.singleton_inter_nonempty
@[simp]
theorem inter_singleton_nonempty : (s ∩ {a}).Nonempty ↔ a ∈ s := by
rw [inter_comm, singleton_inter_nonempty]
#align set.inter_singleton_nonempty Set.inter_singleton_nonempty
@[simp]
theorem singleton_inter_eq_empty : {a} ∩ s = ∅ ↔ a ∉ s :=
not_nonempty_iff_eq_empty.symm.trans singleton_inter_nonempty.not
#align set.singleton_inter_eq_empty Set.singleton_inter_eq_empty
@[simp]
theorem inter_singleton_eq_empty : s ∩ {a} = ∅ ↔ a ∉ s := by
rw [inter_comm, singleton_inter_eq_empty]
#align set.inter_singleton_eq_empty Set.inter_singleton_eq_empty
theorem nmem_singleton_empty {s : Set α} : s ∉ ({∅} : Set (Set α)) ↔ s.Nonempty :=
nonempty_iff_ne_empty.symm
#align set.nmem_singleton_empty Set.nmem_singleton_empty
instance uniqueSingleton (a : α) : Unique (↥({a} : Set α)) :=
⟨⟨⟨a, mem_singleton a⟩⟩, fun ⟨_, h⟩ => Subtype.eq h⟩
#align set.unique_singleton Set.uniqueSingleton
theorem eq_singleton_iff_unique_mem : s = {a} ↔ a ∈ s ∧ ∀ x ∈ s, x = a :=
Subset.antisymm_iff.trans <| and_comm.trans <| and_congr_left' singleton_subset_iff
#align set.eq_singleton_iff_unique_mem Set.eq_singleton_iff_unique_mem
theorem eq_singleton_iff_nonempty_unique_mem : s = {a} ↔ s.Nonempty ∧ ∀ x ∈ s, x = a :=
eq_singleton_iff_unique_mem.trans <|
and_congr_left fun H => ⟨fun h' => ⟨_, h'⟩, fun ⟨x, h⟩ => H x h ▸ h⟩
#align set.eq_singleton_iff_nonempty_unique_mem Set.eq_singleton_iff_nonempty_unique_mem
set_option backward.synthInstance.canonInstances false in -- See https://github.com/leanprover-community/mathlib4/issues/12532
-- while `simp` is capable of proving this, it is not capable of turning the LHS into the RHS.
@[simp]
theorem default_coe_singleton (x : α) : (default : ({x} : Set α)) = ⟨x, rfl⟩ :=
rfl
#align set.default_coe_singleton Set.default_coe_singleton
@[simp]
theorem subset_singleton_iff {α : Type*} {s : Set α} {x : α} : s ⊆ {x} ↔ ∀ y ∈ s, y = x :=
Iff.rfl
#align set.subset_singleton_iff Set.subset_singleton_iff
theorem subset_singleton_iff_eq {s : Set α} {x : α} : s ⊆ {x} ↔ s = ∅ ∨ s = {x} := by
obtain rfl | hs := s.eq_empty_or_nonempty
· exact ⟨fun _ => Or.inl rfl, fun _ => empty_subset _⟩
· simp [eq_singleton_iff_nonempty_unique_mem, hs, hs.ne_empty]
#align set.subset_singleton_iff_eq Set.subset_singleton_iff_eq
theorem Nonempty.subset_singleton_iff (h : s.Nonempty) : s ⊆ {a} ↔ s = {a} :=
subset_singleton_iff_eq.trans <| or_iff_right h.ne_empty
#align set.nonempty.subset_singleton_iff Set.Nonempty.subset_singleton_iff
theorem ssubset_singleton_iff {s : Set α} {x : α} : s ⊂ {x} ↔ s = ∅ := by
rw [ssubset_iff_subset_ne, subset_singleton_iff_eq, or_and_right, and_not_self_iff, or_false_iff,
and_iff_left_iff_imp]
exact fun h => h ▸ (singleton_ne_empty _).symm
#align set.ssubset_singleton_iff Set.ssubset_singleton_iff
theorem eq_empty_of_ssubset_singleton {s : Set α} {x : α} (hs : s ⊂ {x}) : s = ∅ :=
ssubset_singleton_iff.1 hs
#align set.eq_empty_of_ssubset_singleton Set.eq_empty_of_ssubset_singleton
theorem eq_of_nonempty_of_subsingleton {α} [Subsingleton α] (s t : Set α) [Nonempty s]
[Nonempty t] : s = t :=
nonempty_of_nonempty_subtype.eq_univ.trans nonempty_of_nonempty_subtype.eq_univ.symm
theorem eq_of_nonempty_of_subsingleton' {α} [Subsingleton α] {s : Set α} (t : Set α)
(hs : s.Nonempty) [Nonempty t] : s = t :=
have := hs.to_subtype; eq_of_nonempty_of_subsingleton s t
set_option backward.synthInstance.canonInstances false in -- See https://github.com/leanprover-community/mathlib4/issues/12532
theorem Nonempty.eq_zero [Subsingleton α] [Zero α] {s : Set α} (h : s.Nonempty) :
s = {0} := eq_of_nonempty_of_subsingleton' {0} h
set_option backward.synthInstance.canonInstances false in -- See https://github.com/leanprover-community/mathlib4/issues/12532
theorem Nonempty.eq_one [Subsingleton α] [One α] {s : Set α} (h : s.Nonempty) :
s = {1} := eq_of_nonempty_of_subsingleton' {1} h
protected theorem disjoint_iff : Disjoint s t ↔ s ∩ t ⊆ ∅ :=
disjoint_iff_inf_le
#align set.disjoint_iff Set.disjoint_iff
theorem disjoint_iff_inter_eq_empty : Disjoint s t ↔ s ∩ t = ∅ :=
disjoint_iff
#align set.disjoint_iff_inter_eq_empty Set.disjoint_iff_inter_eq_empty
theorem _root_.Disjoint.inter_eq : Disjoint s t → s ∩ t = ∅ :=
Disjoint.eq_bot
#align disjoint.inter_eq Disjoint.inter_eq
theorem disjoint_left : Disjoint s t ↔ ∀ ⦃a⦄, a ∈ s → a ∉ t :=
disjoint_iff_inf_le.trans <| forall_congr' fun _ => not_and
#align set.disjoint_left Set.disjoint_left
theorem disjoint_right : Disjoint s t ↔ ∀ ⦃a⦄, a ∈ t → a ∉ s := by rw [disjoint_comm, disjoint_left]
#align set.disjoint_right Set.disjoint_right
lemma not_disjoint_iff : ¬Disjoint s t ↔ ∃ x, x ∈ s ∧ x ∈ t :=
Set.disjoint_iff.not.trans <| not_forall.trans <| exists_congr fun _ ↦ not_not
#align set.not_disjoint_iff Set.not_disjoint_iff
lemma not_disjoint_iff_nonempty_inter : ¬ Disjoint s t ↔ (s ∩ t).Nonempty := not_disjoint_iff
#align set.not_disjoint_iff_nonempty_inter Set.not_disjoint_iff_nonempty_inter
alias ⟨_, Nonempty.not_disjoint⟩ := not_disjoint_iff_nonempty_inter
#align set.nonempty.not_disjoint Set.Nonempty.not_disjoint
lemma disjoint_or_nonempty_inter (s t : Set α) : Disjoint s t ∨ (s ∩ t).Nonempty :=
(em _).imp_right not_disjoint_iff_nonempty_inter.1
#align set.disjoint_or_nonempty_inter Set.disjoint_or_nonempty_inter
lemma disjoint_iff_forall_ne : Disjoint s t ↔ ∀ ⦃a⦄, a ∈ s → ∀ ⦃b⦄, b ∈ t → a ≠ b := by
simp only [Ne, disjoint_left, @imp_not_comm _ (_ = _), forall_eq']
#align set.disjoint_iff_forall_ne Set.disjoint_iff_forall_ne
alias ⟨_root_.Disjoint.ne_of_mem, _⟩ := disjoint_iff_forall_ne
#align disjoint.ne_of_mem Disjoint.ne_of_mem
lemma disjoint_of_subset_left (h : s ⊆ u) (d : Disjoint u t) : Disjoint s t := d.mono_left h
#align set.disjoint_of_subset_left Set.disjoint_of_subset_left
lemma disjoint_of_subset_right (h : t ⊆ u) (d : Disjoint s u) : Disjoint s t := d.mono_right h
#align set.disjoint_of_subset_right Set.disjoint_of_subset_right
lemma disjoint_of_subset (hs : s₁ ⊆ s₂) (ht : t₁ ⊆ t₂) (h : Disjoint s₂ t₂) : Disjoint s₁ t₁ :=
h.mono hs ht
#align set.disjoint_of_subset Set.disjoint_of_subset
@[simp]
lemma disjoint_union_left : Disjoint (s ∪ t) u ↔ Disjoint s u ∧ Disjoint t u := disjoint_sup_left
#align set.disjoint_union_left Set.disjoint_union_left
@[simp]
lemma disjoint_union_right : Disjoint s (t ∪ u) ↔ Disjoint s t ∧ Disjoint s u := disjoint_sup_right
#align set.disjoint_union_right Set.disjoint_union_right
@[simp] lemma disjoint_empty (s : Set α) : Disjoint s ∅ := disjoint_bot_right
#align set.disjoint_empty Set.disjoint_empty
@[simp] lemma empty_disjoint (s : Set α) : Disjoint ∅ s := disjoint_bot_left
#align set.empty_disjoint Set.empty_disjoint
@[simp] lemma univ_disjoint : Disjoint univ s ↔ s = ∅ := top_disjoint
#align set.univ_disjoint Set.univ_disjoint
@[simp] lemma disjoint_univ : Disjoint s univ ↔ s = ∅ := disjoint_top
#align set.disjoint_univ Set.disjoint_univ
lemma disjoint_sdiff_left : Disjoint (t \ s) s := disjoint_sdiff_self_left
#align set.disjoint_sdiff_left Set.disjoint_sdiff_left
lemma disjoint_sdiff_right : Disjoint s (t \ s) := disjoint_sdiff_self_right
#align set.disjoint_sdiff_right Set.disjoint_sdiff_right
-- TODO: prove this in terms of a lattice lemma
theorem disjoint_sdiff_inter : Disjoint (s \ t) (s ∩ t) :=
disjoint_of_subset_right inter_subset_right disjoint_sdiff_left
#align set.disjoint_sdiff_inter Set.disjoint_sdiff_inter
theorem diff_union_diff_cancel (hts : t ⊆ s) (hut : u ⊆ t) : s \ t ∪ t \ u = s \ u :=
sdiff_sup_sdiff_cancel hts hut
#align set.diff_union_diff_cancel Set.diff_union_diff_cancel
theorem diff_diff_eq_sdiff_union (h : u ⊆ s) : s \ (t \ u) = s \ t ∪ u := sdiff_sdiff_eq_sdiff_sup h
#align set.diff_diff_eq_sdiff_union Set.diff_diff_eq_sdiff_union
@[simp default+1]
lemma disjoint_singleton_left : Disjoint {a} s ↔ a ∉ s := by simp [Set.disjoint_iff, subset_def]
#align set.disjoint_singleton_left Set.disjoint_singleton_left
@[simp]
lemma disjoint_singleton_right : Disjoint s {a} ↔ a ∉ s :=
disjoint_comm.trans disjoint_singleton_left
#align set.disjoint_singleton_right Set.disjoint_singleton_right
lemma disjoint_singleton : Disjoint ({a} : Set α) {b} ↔ a ≠ b := by
simp
#align set.disjoint_singleton Set.disjoint_singleton
lemma subset_diff : s ⊆ t \ u ↔ s ⊆ t ∧ Disjoint s u := le_iff_subset.symm.trans le_sdiff
#align set.subset_diff Set.subset_diff
lemma ssubset_iff_sdiff_singleton : s ⊂ t ↔ ∃ a ∈ t, s ⊆ t \ {a} := by
simp [ssubset_iff_insert, subset_diff, insert_subset_iff]; aesop
theorem inter_diff_distrib_left (s t u : Set α) : s ∩ (t \ u) = (s ∩ t) \ (s ∩ u) :=
inf_sdiff_distrib_left _ _ _
#align set.inter_diff_distrib_left Set.inter_diff_distrib_left
theorem inter_diff_distrib_right (s t u : Set α) : s \ t ∩ u = (s ∩ u) \ (t ∩ u) :=
inf_sdiff_distrib_right _ _ _
#align set.inter_diff_distrib_right Set.inter_diff_distrib_right
theorem compl_def (s : Set α) : sᶜ = { x | x ∉ s } :=
rfl
#align set.compl_def Set.compl_def
theorem mem_compl {s : Set α} {x : α} (h : x ∉ s) : x ∈ sᶜ :=
h
#align set.mem_compl Set.mem_compl
theorem compl_setOf {α} (p : α → Prop) : { a | p a }ᶜ = { a | ¬p a } :=
rfl
#align set.compl_set_of Set.compl_setOf
theorem not_mem_of_mem_compl {s : Set α} {x : α} (h : x ∈ sᶜ) : x ∉ s :=
h
#align set.not_mem_of_mem_compl Set.not_mem_of_mem_compl
theorem not_mem_compl_iff {x : α} : x ∉ sᶜ ↔ x ∈ s :=
not_not
#align set.not_mem_compl_iff Set.not_mem_compl_iff
@[simp]
theorem inter_compl_self (s : Set α) : s ∩ sᶜ = ∅ :=
inf_compl_eq_bot
#align set.inter_compl_self Set.inter_compl_self
@[simp]
theorem compl_inter_self (s : Set α) : sᶜ ∩ s = ∅ :=
compl_inf_eq_bot
#align set.compl_inter_self Set.compl_inter_self
@[simp]
theorem compl_empty : (∅ : Set α)ᶜ = univ :=
compl_bot
#align set.compl_empty Set.compl_empty
@[simp]
theorem compl_union (s t : Set α) : (s ∪ t)ᶜ = sᶜ ∩ tᶜ :=
compl_sup
#align set.compl_union Set.compl_union
theorem compl_inter (s t : Set α) : (s ∩ t)ᶜ = sᶜ ∪ tᶜ :=
compl_inf
#align set.compl_inter Set.compl_inter
@[simp]
theorem compl_univ : (univ : Set α)ᶜ = ∅ :=
compl_top
#align set.compl_univ Set.compl_univ
@[simp]
theorem compl_empty_iff {s : Set α} : sᶜ = ∅ ↔ s = univ :=
compl_eq_bot
#align set.compl_empty_iff Set.compl_empty_iff
@[simp]
theorem compl_univ_iff {s : Set α} : sᶜ = univ ↔ s = ∅ :=
compl_eq_top
#align set.compl_univ_iff Set.compl_univ_iff
theorem compl_ne_univ : sᶜ ≠ univ ↔ s.Nonempty :=
compl_univ_iff.not.trans nonempty_iff_ne_empty.symm
#align set.compl_ne_univ Set.compl_ne_univ
theorem nonempty_compl : sᶜ.Nonempty ↔ s ≠ univ :=
(ne_univ_iff_exists_not_mem s).symm
#align set.nonempty_compl Set.nonempty_compl
@[simp] lemma nonempty_compl_of_nontrivial [Nontrivial α] (x : α) : Set.Nonempty {x}ᶜ := by
obtain ⟨y, hy⟩ := exists_ne x
exact ⟨y, by simp [hy]⟩
theorem mem_compl_singleton_iff {a x : α} : x ∈ ({a} : Set α)ᶜ ↔ x ≠ a :=
Iff.rfl
#align set.mem_compl_singleton_iff Set.mem_compl_singleton_iff
theorem compl_singleton_eq (a : α) : ({a} : Set α)ᶜ = { x | x ≠ a } :=
rfl
#align set.compl_singleton_eq Set.compl_singleton_eq
@[simp]
theorem compl_ne_eq_singleton (a : α) : ({ x | x ≠ a } : Set α)ᶜ = {a} :=
compl_compl _
#align set.compl_ne_eq_singleton Set.compl_ne_eq_singleton
theorem union_eq_compl_compl_inter_compl (s t : Set α) : s ∪ t = (sᶜ ∩ tᶜ)ᶜ :=
ext fun _ => or_iff_not_and_not
#align set.union_eq_compl_compl_inter_compl Set.union_eq_compl_compl_inter_compl
theorem inter_eq_compl_compl_union_compl (s t : Set α) : s ∩ t = (sᶜ ∪ tᶜ)ᶜ :=
ext fun _ => and_iff_not_or_not
#align set.inter_eq_compl_compl_union_compl Set.inter_eq_compl_compl_union_compl
@[simp]
theorem union_compl_self (s : Set α) : s ∪ sᶜ = univ :=
eq_univ_iff_forall.2 fun _ => em _
#align set.union_compl_self Set.union_compl_self
@[simp]
theorem compl_union_self (s : Set α) : sᶜ ∪ s = univ := by rw [union_comm, union_compl_self]
#align set.compl_union_self Set.compl_union_self
theorem compl_subset_comm : sᶜ ⊆ t ↔ tᶜ ⊆ s :=
@compl_le_iff_compl_le _ s _ _
#align set.compl_subset_comm Set.compl_subset_comm
theorem subset_compl_comm : s ⊆ tᶜ ↔ t ⊆ sᶜ :=
@le_compl_iff_le_compl _ _ _ t
#align set.subset_compl_comm Set.subset_compl_comm
@[simp]
theorem compl_subset_compl : sᶜ ⊆ tᶜ ↔ t ⊆ s :=
@compl_le_compl_iff_le (Set α) _ _ _
#align set.compl_subset_compl Set.compl_subset_compl
@[gcongr] theorem compl_subset_compl_of_subset (h : t ⊆ s) : sᶜ ⊆ tᶜ := compl_subset_compl.2 h
theorem subset_compl_iff_disjoint_left : s ⊆ tᶜ ↔ Disjoint t s :=
@le_compl_iff_disjoint_left (Set α) _ _ _
#align set.subset_compl_iff_disjoint_left Set.subset_compl_iff_disjoint_left
theorem subset_compl_iff_disjoint_right : s ⊆ tᶜ ↔ Disjoint s t :=
@le_compl_iff_disjoint_right (Set α) _ _ _
#align set.subset_compl_iff_disjoint_right Set.subset_compl_iff_disjoint_right
theorem disjoint_compl_left_iff_subset : Disjoint sᶜ t ↔ t ⊆ s :=
disjoint_compl_left_iff
#align set.disjoint_compl_left_iff_subset Set.disjoint_compl_left_iff_subset
theorem disjoint_compl_right_iff_subset : Disjoint s tᶜ ↔ s ⊆ t :=
disjoint_compl_right_iff
#align set.disjoint_compl_right_iff_subset Set.disjoint_compl_right_iff_subset
alias ⟨_, _root_.Disjoint.subset_compl_right⟩ := subset_compl_iff_disjoint_right
#align disjoint.subset_compl_right Disjoint.subset_compl_right
alias ⟨_, _root_.Disjoint.subset_compl_left⟩ := subset_compl_iff_disjoint_left
#align disjoint.subset_compl_left Disjoint.subset_compl_left
alias ⟨_, _root_.HasSubset.Subset.disjoint_compl_left⟩ := disjoint_compl_left_iff_subset
#align has_subset.subset.disjoint_compl_left HasSubset.Subset.disjoint_compl_left
alias ⟨_, _root_.HasSubset.Subset.disjoint_compl_right⟩ := disjoint_compl_right_iff_subset
#align has_subset.subset.disjoint_compl_right HasSubset.Subset.disjoint_compl_right
theorem subset_union_compl_iff_inter_subset {s t u : Set α} : s ⊆ t ∪ uᶜ ↔ s ∩ u ⊆ t :=
(@isCompl_compl _ u _).le_sup_right_iff_inf_left_le
#align set.subset_union_compl_iff_inter_subset Set.subset_union_compl_iff_inter_subset
theorem compl_subset_iff_union {s t : Set α} : sᶜ ⊆ t ↔ s ∪ t = univ :=
Iff.symm <| eq_univ_iff_forall.trans <| forall_congr' fun _ => or_iff_not_imp_left
#align set.compl_subset_iff_union Set.compl_subset_iff_union
@[simp]
theorem subset_compl_singleton_iff {a : α} {s : Set α} : s ⊆ {a}ᶜ ↔ a ∉ s :=
subset_compl_comm.trans singleton_subset_iff
#align set.subset_compl_singleton_iff Set.subset_compl_singleton_iff
theorem inter_subset (a b c : Set α) : a ∩ b ⊆ c ↔ a ⊆ bᶜ ∪ c :=
forall_congr' fun _ => and_imp.trans <| imp_congr_right fun _ => imp_iff_not_or
#align set.inter_subset Set.inter_subset
theorem inter_compl_nonempty_iff {s t : Set α} : (s ∩ tᶜ).Nonempty ↔ ¬s ⊆ t :=
(not_subset.trans <| exists_congr fun x => by simp [mem_compl]).symm
#align set.inter_compl_nonempty_iff Set.inter_compl_nonempty_iff
theorem not_mem_diff_of_mem {s t : Set α} {x : α} (hx : x ∈ t) : x ∉ s \ t := fun h => h.2 hx
#align set.not_mem_diff_of_mem Set.not_mem_diff_of_mem
theorem mem_of_mem_diff {s t : Set α} {x : α} (h : x ∈ s \ t) : x ∈ s :=
h.left
#align set.mem_of_mem_diff Set.mem_of_mem_diff
theorem not_mem_of_mem_diff {s t : Set α} {x : α} (h : x ∈ s \ t) : x ∉ t :=
h.right
#align set.not_mem_of_mem_diff Set.not_mem_of_mem_diff
theorem diff_eq_compl_inter {s t : Set α} : s \ t = tᶜ ∩ s := by rw [diff_eq, inter_comm]
#align set.diff_eq_compl_inter Set.diff_eq_compl_inter
theorem nonempty_diff {s t : Set α} : (s \ t).Nonempty ↔ ¬s ⊆ t :=
inter_compl_nonempty_iff
#align set.nonempty_diff Set.nonempty_diff
theorem diff_subset {s t : Set α} : s \ t ⊆ s := show s \ t ≤ s from sdiff_le
#align set.diff_subset Set.diff_subset
theorem diff_subset_compl (s t : Set α) : s \ t ⊆ tᶜ :=
diff_eq_compl_inter ▸ inter_subset_left
theorem union_diff_cancel' {s t u : Set α} (h₁ : s ⊆ t) (h₂ : t ⊆ u) : t ∪ u \ s = u :=
sup_sdiff_cancel' h₁ h₂
#align set.union_diff_cancel' Set.union_diff_cancel'
theorem union_diff_cancel {s t : Set α} (h : s ⊆ t) : s ∪ t \ s = t :=
sup_sdiff_cancel_right h
#align set.union_diff_cancel Set.union_diff_cancel
theorem union_diff_cancel_left {s t : Set α} (h : s ∩ t ⊆ ∅) : (s ∪ t) \ s = t :=
Disjoint.sup_sdiff_cancel_left <| disjoint_iff_inf_le.2 h
#align set.union_diff_cancel_left Set.union_diff_cancel_left
theorem union_diff_cancel_right {s t : Set α} (h : s ∩ t ⊆ ∅) : (s ∪ t) \ t = s :=
Disjoint.sup_sdiff_cancel_right <| disjoint_iff_inf_le.2 h
#align set.union_diff_cancel_right Set.union_diff_cancel_right
@[simp]
theorem union_diff_left {s t : Set α} : (s ∪ t) \ s = t \ s :=
sup_sdiff_left_self
#align set.union_diff_left Set.union_diff_left
@[simp]
theorem union_diff_right {s t : Set α} : (s ∪ t) \ t = s \ t :=
sup_sdiff_right_self
#align set.union_diff_right Set.union_diff_right
theorem union_diff_distrib {s t u : Set α} : (s ∪ t) \ u = s \ u ∪ t \ u :=
sup_sdiff
#align set.union_diff_distrib Set.union_diff_distrib
theorem inter_diff_assoc (a b c : Set α) : (a ∩ b) \ c = a ∩ (b \ c) :=
inf_sdiff_assoc
#align set.inter_diff_assoc Set.inter_diff_assoc
@[simp]
theorem inter_diff_self (a b : Set α) : a ∩ (b \ a) = ∅ :=
inf_sdiff_self_right
#align set.inter_diff_self Set.inter_diff_self
@[simp]
theorem inter_union_diff (s t : Set α) : s ∩ t ∪ s \ t = s :=
sup_inf_sdiff s t
#align set.inter_union_diff Set.inter_union_diff
@[simp]
theorem diff_union_inter (s t : Set α) : s \ t ∪ s ∩ t = s := by
rw [union_comm]
exact sup_inf_sdiff _ _
#align set.diff_union_inter Set.diff_union_inter
@[simp]
theorem inter_union_compl (s t : Set α) : s ∩ t ∪ s ∩ tᶜ = s :=
inter_union_diff _ _
#align set.inter_union_compl Set.inter_union_compl
@[gcongr]
theorem diff_subset_diff {s₁ s₂ t₁ t₂ : Set α} : s₁ ⊆ s₂ → t₂ ⊆ t₁ → s₁ \ t₁ ⊆ s₂ \ t₂ :=
show s₁ ≤ s₂ → t₂ ≤ t₁ → s₁ \ t₁ ≤ s₂ \ t₂ from sdiff_le_sdiff
#align set.diff_subset_diff Set.diff_subset_diff
@[gcongr]
theorem diff_subset_diff_left {s₁ s₂ t : Set α} (h : s₁ ⊆ s₂) : s₁ \ t ⊆ s₂ \ t :=
sdiff_le_sdiff_right ‹s₁ ≤ s₂›
#align set.diff_subset_diff_left Set.diff_subset_diff_left
@[gcongr]
theorem diff_subset_diff_right {s t u : Set α} (h : t ⊆ u) : s \ u ⊆ s \ t :=
sdiff_le_sdiff_left ‹t ≤ u›
#align set.diff_subset_diff_right Set.diff_subset_diff_right
theorem compl_eq_univ_diff (s : Set α) : sᶜ = univ \ s :=
top_sdiff.symm
#align set.compl_eq_univ_diff Set.compl_eq_univ_diff
@[simp]
theorem empty_diff (s : Set α) : (∅ \ s : Set α) = ∅ :=
bot_sdiff
#align set.empty_diff Set.empty_diff
theorem diff_eq_empty {s t : Set α} : s \ t = ∅ ↔ s ⊆ t :=
sdiff_eq_bot_iff
#align set.diff_eq_empty Set.diff_eq_empty
@[simp]
theorem diff_empty {s : Set α} : s \ ∅ = s :=
sdiff_bot
#align set.diff_empty Set.diff_empty
@[simp]
theorem diff_univ (s : Set α) : s \ univ = ∅ :=
diff_eq_empty.2 (subset_univ s)
#align set.diff_univ Set.diff_univ
theorem diff_diff {u : Set α} : (s \ t) \ u = s \ (t ∪ u) :=
sdiff_sdiff_left
#align set.diff_diff Set.diff_diff
-- the following statement contains parentheses to help the reader
theorem diff_diff_comm {s t u : Set α} : (s \ t) \ u = (s \ u) \ t :=
sdiff_sdiff_comm
#align set.diff_diff_comm Set.diff_diff_comm
theorem diff_subset_iff {s t u : Set α} : s \ t ⊆ u ↔ s ⊆ t ∪ u :=
show s \ t ≤ u ↔ s ≤ t ∪ u from sdiff_le_iff
#align set.diff_subset_iff Set.diff_subset_iff
theorem subset_diff_union (s t : Set α) : s ⊆ s \ t ∪ t :=
show s ≤ s \ t ∪ t from le_sdiff_sup
#align set.subset_diff_union Set.subset_diff_union
theorem diff_union_of_subset {s t : Set α} (h : t ⊆ s) : s \ t ∪ t = s :=
Subset.antisymm (union_subset diff_subset h) (subset_diff_union _ _)
#align set.diff_union_of_subset Set.diff_union_of_subset
@[simp]
theorem diff_singleton_subset_iff {x : α} {s t : Set α} : s \ {x} ⊆ t ↔ s ⊆ insert x t := by
rw [← union_singleton, union_comm]
apply diff_subset_iff
#align set.diff_singleton_subset_iff Set.diff_singleton_subset_iff
theorem subset_diff_singleton {x : α} {s t : Set α} (h : s ⊆ t) (hx : x ∉ s) : s ⊆ t \ {x} :=
subset_inter h <| subset_compl_comm.1 <| singleton_subset_iff.2 hx
#align set.subset_diff_singleton Set.subset_diff_singleton
theorem subset_insert_diff_singleton (x : α) (s : Set α) : s ⊆ insert x (s \ {x}) := by
rw [← diff_singleton_subset_iff]
#align set.subset_insert_diff_singleton Set.subset_insert_diff_singleton
theorem diff_subset_comm {s t u : Set α} : s \ t ⊆ u ↔ s \ u ⊆ t :=
show s \ t ≤ u ↔ s \ u ≤ t from sdiff_le_comm
#align set.diff_subset_comm Set.diff_subset_comm
theorem diff_inter {s t u : Set α} : s \ (t ∩ u) = s \ t ∪ s \ u :=
sdiff_inf
#align set.diff_inter Set.diff_inter
theorem diff_inter_diff {s t u : Set α} : s \ t ∩ (s \ u) = s \ (t ∪ u) :=
sdiff_sup.symm
#align set.diff_inter_diff Set.diff_inter_diff
theorem diff_compl : s \ tᶜ = s ∩ t :=
sdiff_compl
#align set.diff_compl Set.diff_compl
theorem diff_diff_right {s t u : Set α} : s \ (t \ u) = s \ t ∪ s ∩ u :=
sdiff_sdiff_right'
#align set.diff_diff_right Set.diff_diff_right
@[simp]
theorem insert_diff_of_mem (s) (h : a ∈ t) : insert a s \ t = s \ t := by
ext
constructor <;> simp (config := { contextual := true }) [or_imp, h]
#align set.insert_diff_of_mem Set.insert_diff_of_mem
theorem insert_diff_of_not_mem (s) (h : a ∉ t) : insert a s \ t = insert a (s \ t) := by
classical
ext x
by_cases h' : x ∈ t
· have : x ≠ a := by
intro H
rw [H] at h'
exact h h'
simp [h, h', this]
· simp [h, h']
#align set.insert_diff_of_not_mem Set.insert_diff_of_not_mem
theorem insert_diff_self_of_not_mem {a : α} {s : Set α} (h : a ∉ s) : insert a s \ {a} = s := by
ext x
simp [and_iff_left_of_imp fun hx : x ∈ s => show x ≠ a from fun hxa => h <| hxa ▸ hx]
#align set.insert_diff_self_of_not_mem Set.insert_diff_self_of_not_mem
@[simp]
theorem insert_diff_eq_singleton {a : α} {s : Set α} (h : a ∉ s) : insert a s \ s = {a} := by
ext
rw [Set.mem_diff, Set.mem_insert_iff, Set.mem_singleton_iff, or_and_right, and_not_self_iff,
or_false_iff, and_iff_left_iff_imp]
rintro rfl
exact h
#align set.insert_diff_eq_singleton Set.insert_diff_eq_singleton
theorem inter_insert_of_mem (h : a ∈ s) : s ∩ insert a t = insert a (s ∩ t) := by
rw [insert_inter_distrib, insert_eq_of_mem h]
#align set.inter_insert_of_mem Set.inter_insert_of_mem
theorem insert_inter_of_mem (h : a ∈ t) : insert a s ∩ t = insert a (s ∩ t) := by
rw [insert_inter_distrib, insert_eq_of_mem h]
#align set.insert_inter_of_mem Set.insert_inter_of_mem
theorem inter_insert_of_not_mem (h : a ∉ s) : s ∩ insert a t = s ∩ t :=
ext fun _ => and_congr_right fun hx => or_iff_right <| ne_of_mem_of_not_mem hx h
#align set.inter_insert_of_not_mem Set.inter_insert_of_not_mem
theorem insert_inter_of_not_mem (h : a ∉ t) : insert a s ∩ t = s ∩ t :=
ext fun _ => and_congr_left fun hx => or_iff_right <| ne_of_mem_of_not_mem hx h
#align set.insert_inter_of_not_mem Set.insert_inter_of_not_mem
@[simp]
theorem union_diff_self {s t : Set α} : s ∪ t \ s = s ∪ t :=
sup_sdiff_self _ _
#align set.union_diff_self Set.union_diff_self
@[simp]
theorem diff_union_self {s t : Set α} : s \ t ∪ t = s ∪ t :=
sdiff_sup_self _ _
#align set.diff_union_self Set.diff_union_self
@[simp]
theorem diff_inter_self {a b : Set α} : b \ a ∩ a = ∅ :=
inf_sdiff_self_left
#align set.diff_inter_self Set.diff_inter_self
@[simp]
theorem diff_inter_self_eq_diff {s t : Set α} : s \ (t ∩ s) = s \ t :=
sdiff_inf_self_right _ _
#align set.diff_inter_self_eq_diff Set.diff_inter_self_eq_diff
@[simp]
theorem diff_self_inter {s t : Set α} : s \ (s ∩ t) = s \ t :=
sdiff_inf_self_left _ _
#align set.diff_self_inter Set.diff_self_inter
@[simp]
theorem diff_singleton_eq_self {a : α} {s : Set α} (h : a ∉ s) : s \ {a} = s :=
sdiff_eq_self_iff_disjoint.2 <| by simp [h]
#align set.diff_singleton_eq_self Set.diff_singleton_eq_self
@[simp]
theorem diff_singleton_sSubset {s : Set α} {a : α} : s \ {a} ⊂ s ↔ a ∈ s :=
sdiff_le.lt_iff_ne.trans <| sdiff_eq_left.not.trans <| by simp
#align set.diff_singleton_ssubset Set.diff_singleton_sSubset
@[simp]
theorem insert_diff_singleton {a : α} {s : Set α} : insert a (s \ {a}) = insert a s := by
simp [insert_eq, union_diff_self, -union_singleton, -singleton_union]
#align set.insert_diff_singleton Set.insert_diff_singleton
theorem insert_diff_singleton_comm (hab : a ≠ b) (s : Set α) :
insert a (s \ {b}) = insert a s \ {b} := by
simp_rw [← union_singleton, union_diff_distrib,
diff_singleton_eq_self (mem_singleton_iff.not.2 hab.symm)]
#align set.insert_diff_singleton_comm Set.insert_diff_singleton_comm
--Porting note (#10618): removed `simp` attribute because `simp` can prove it
theorem diff_self {s : Set α} : s \ s = ∅ :=
sdiff_self
#align set.diff_self Set.diff_self
theorem diff_diff_right_self (s t : Set α) : s \ (s \ t) = s ∩ t :=
sdiff_sdiff_right_self
#align set.diff_diff_right_self Set.diff_diff_right_self
theorem diff_diff_cancel_left {s t : Set α} (h : s ⊆ t) : t \ (t \ s) = s :=
sdiff_sdiff_eq_self h
#align set.diff_diff_cancel_left Set.diff_diff_cancel_left
theorem mem_diff_singleton {x y : α} {s : Set α} : x ∈ s \ {y} ↔ x ∈ s ∧ x ≠ y :=
Iff.rfl
#align set.mem_diff_singleton Set.mem_diff_singleton
theorem mem_diff_singleton_empty {t : Set (Set α)} : s ∈ t \ {∅} ↔ s ∈ t ∧ s.Nonempty :=
mem_diff_singleton.trans <| and_congr_right' nonempty_iff_ne_empty.symm
#align set.mem_diff_singleton_empty Set.mem_diff_singleton_empty
| Mathlib/Data/Set/Basic.lean | 2,055 | 2,060 | theorem subset_insert_iff {s t : Set α} {x : α} :
s ⊆ insert x t ↔ s ⊆ t ∨ (x ∈ s ∧ s \ {x} ⊆ t) := by |
rw [← diff_singleton_subset_iff]
by_cases hx : x ∈ s
· rw [and_iff_right hx, or_iff_right_of_imp diff_subset.trans]
rw [diff_singleton_eq_self hx, or_iff_left_of_imp And.right]
|
import Mathlib.Data.Real.Sqrt
import Mathlib.Analysis.NormedSpace.Star.Basic
import Mathlib.Analysis.NormedSpace.ContinuousLinearMap
import Mathlib.Analysis.NormedSpace.Basic
#align_import data.is_R_or_C.basic from "leanprover-community/mathlib"@"baa88307f3e699fa7054ef04ec79fa4f056169cb"
section
local notation "𝓚" => algebraMap ℝ _
open ComplexConjugate
class RCLike (K : semiOutParam Type*) extends DenselyNormedField K, StarRing K,
NormedAlgebra ℝ K, CompleteSpace K where
re : K →+ ℝ
im : K →+ ℝ
I : K
I_re_ax : re I = 0
I_mul_I_ax : I = 0 ∨ I * I = -1
re_add_im_ax : ∀ z : K, 𝓚 (re z) + 𝓚 (im z) * I = z
ofReal_re_ax : ∀ r : ℝ, re (𝓚 r) = r
ofReal_im_ax : ∀ r : ℝ, im (𝓚 r) = 0
mul_re_ax : ∀ z w : K, re (z * w) = re z * re w - im z * im w
mul_im_ax : ∀ z w : K, im (z * w) = re z * im w + im z * re w
conj_re_ax : ∀ z : K, re (conj z) = re z
conj_im_ax : ∀ z : K, im (conj z) = -im z
conj_I_ax : conj I = -I
norm_sq_eq_def_ax : ∀ z : K, ‖z‖ ^ 2 = re z * re z + im z * im z
mul_im_I_ax : ∀ z : K, im z * im I = im z
[toPartialOrder : PartialOrder K]
le_iff_re_im {z w : K} : z ≤ w ↔ re z ≤ re w ∧ im z = im w
-- note we cannot put this in the `extends` clause
[toDecidableEq : DecidableEq K]
#align is_R_or_C RCLike
scoped[ComplexOrder] attribute [instance 100] RCLike.toPartialOrder
attribute [instance 100] RCLike.toDecidableEq
end
variable {K E : Type*} [RCLike K]
namespace RCLike
open ComplexConjugate
@[coe] abbrev ofReal : ℝ → K := Algebra.cast
noncomputable instance (priority := 900) algebraMapCoe : CoeTC ℝ K :=
⟨ofReal⟩
#align is_R_or_C.algebra_map_coe RCLike.algebraMapCoe
theorem ofReal_alg (x : ℝ) : (x : K) = x • (1 : K) :=
Algebra.algebraMap_eq_smul_one x
#align is_R_or_C.of_real_alg RCLike.ofReal_alg
theorem real_smul_eq_coe_mul (r : ℝ) (z : K) : r • z = (r : K) * z :=
Algebra.smul_def r z
#align is_R_or_C.real_smul_eq_coe_mul RCLike.real_smul_eq_coe_mul
theorem real_smul_eq_coe_smul [AddCommGroup E] [Module K E] [Module ℝ E] [IsScalarTower ℝ K E]
(r : ℝ) (x : E) : r • x = (r : K) • x := by rw [RCLike.ofReal_alg, smul_one_smul]
#align is_R_or_C.real_smul_eq_coe_smul RCLike.real_smul_eq_coe_smul
theorem algebraMap_eq_ofReal : ⇑(algebraMap ℝ K) = ofReal :=
rfl
#align is_R_or_C.algebra_map_eq_of_real RCLike.algebraMap_eq_ofReal
@[simp, rclike_simps]
theorem re_add_im (z : K) : (re z : K) + im z * I = z :=
RCLike.re_add_im_ax z
#align is_R_or_C.re_add_im RCLike.re_add_im
@[simp, norm_cast, rclike_simps]
theorem ofReal_re : ∀ r : ℝ, re (r : K) = r :=
RCLike.ofReal_re_ax
#align is_R_or_C.of_real_re RCLike.ofReal_re
@[simp, norm_cast, rclike_simps]
theorem ofReal_im : ∀ r : ℝ, im (r : K) = 0 :=
RCLike.ofReal_im_ax
#align is_R_or_C.of_real_im RCLike.ofReal_im
@[simp, rclike_simps]
theorem mul_re : ∀ z w : K, re (z * w) = re z * re w - im z * im w :=
RCLike.mul_re_ax
#align is_R_or_C.mul_re RCLike.mul_re
@[simp, rclike_simps]
theorem mul_im : ∀ z w : K, im (z * w) = re z * im w + im z * re w :=
RCLike.mul_im_ax
#align is_R_or_C.mul_im RCLike.mul_im
theorem ext_iff {z w : K} : z = w ↔ re z = re w ∧ im z = im w :=
⟨fun h => h ▸ ⟨rfl, rfl⟩, fun ⟨h₁, h₂⟩ => re_add_im z ▸ re_add_im w ▸ h₁ ▸ h₂ ▸ rfl⟩
#align is_R_or_C.ext_iff RCLike.ext_iff
theorem ext {z w : K} (hre : re z = re w) (him : im z = im w) : z = w :=
ext_iff.2 ⟨hre, him⟩
#align is_R_or_C.ext RCLike.ext
@[norm_cast]
theorem ofReal_zero : ((0 : ℝ) : K) = 0 :=
algebraMap.coe_zero
#align is_R_or_C.of_real_zero RCLike.ofReal_zero
@[rclike_simps]
theorem zero_re' : re (0 : K) = (0 : ℝ) :=
map_zero re
#align is_R_or_C.zero_re' RCLike.zero_re'
@[norm_cast]
theorem ofReal_one : ((1 : ℝ) : K) = 1 :=
map_one (algebraMap ℝ K)
#align is_R_or_C.of_real_one RCLike.ofReal_one
@[simp, rclike_simps]
theorem one_re : re (1 : K) = 1 := by rw [← ofReal_one, ofReal_re]
#align is_R_or_C.one_re RCLike.one_re
@[simp, rclike_simps]
theorem one_im : im (1 : K) = 0 := by rw [← ofReal_one, ofReal_im]
#align is_R_or_C.one_im RCLike.one_im
theorem ofReal_injective : Function.Injective ((↑) : ℝ → K) :=
(algebraMap ℝ K).injective
#align is_R_or_C.of_real_injective RCLike.ofReal_injective
@[norm_cast]
theorem ofReal_inj {z w : ℝ} : (z : K) = (w : K) ↔ z = w :=
algebraMap.coe_inj
#align is_R_or_C.of_real_inj RCLike.ofReal_inj
-- replaced by `RCLike.ofNat_re`
#noalign is_R_or_C.bit0_re
#noalign is_R_or_C.bit1_re
-- replaced by `RCLike.ofNat_im`
#noalign is_R_or_C.bit0_im
#noalign is_R_or_C.bit1_im
theorem ofReal_eq_zero {x : ℝ} : (x : K) = 0 ↔ x = 0 :=
algebraMap.lift_map_eq_zero_iff x
#align is_R_or_C.of_real_eq_zero RCLike.ofReal_eq_zero
theorem ofReal_ne_zero {x : ℝ} : (x : K) ≠ 0 ↔ x ≠ 0 :=
ofReal_eq_zero.not
#align is_R_or_C.of_real_ne_zero RCLike.ofReal_ne_zero
@[simp, rclike_simps, norm_cast]
theorem ofReal_add (r s : ℝ) : ((r + s : ℝ) : K) = r + s :=
algebraMap.coe_add _ _
#align is_R_or_C.of_real_add RCLike.ofReal_add
-- replaced by `RCLike.ofReal_ofNat`
#noalign is_R_or_C.of_real_bit0
#noalign is_R_or_C.of_real_bit1
@[simp, norm_cast, rclike_simps]
theorem ofReal_neg (r : ℝ) : ((-r : ℝ) : K) = -r :=
algebraMap.coe_neg r
#align is_R_or_C.of_real_neg RCLike.ofReal_neg
@[simp, norm_cast, rclike_simps]
theorem ofReal_sub (r s : ℝ) : ((r - s : ℝ) : K) = r - s :=
map_sub (algebraMap ℝ K) r s
#align is_R_or_C.of_real_sub RCLike.ofReal_sub
@[simp, rclike_simps, norm_cast]
theorem ofReal_sum {α : Type*} (s : Finset α) (f : α → ℝ) :
((∑ i ∈ s, f i : ℝ) : K) = ∑ i ∈ s, (f i : K) :=
map_sum (algebraMap ℝ K) _ _
#align is_R_or_C.of_real_sum RCLike.ofReal_sum
@[simp, rclike_simps, norm_cast]
theorem ofReal_finsupp_sum {α M : Type*} [Zero M] (f : α →₀ M) (g : α → M → ℝ) :
((f.sum fun a b => g a b : ℝ) : K) = f.sum fun a b => (g a b : K) :=
map_finsupp_sum (algebraMap ℝ K) f g
#align is_R_or_C.of_real_finsupp_sum RCLike.ofReal_finsupp_sum
@[simp, norm_cast, rclike_simps]
theorem ofReal_mul (r s : ℝ) : ((r * s : ℝ) : K) = r * s :=
algebraMap.coe_mul _ _
#align is_R_or_C.of_real_mul RCLike.ofReal_mul
@[simp, norm_cast, rclike_simps]
theorem ofReal_pow (r : ℝ) (n : ℕ) : ((r ^ n : ℝ) : K) = (r : K) ^ n :=
map_pow (algebraMap ℝ K) r n
#align is_R_or_C.of_real_pow RCLike.ofReal_pow
@[simp, rclike_simps, norm_cast]
theorem ofReal_prod {α : Type*} (s : Finset α) (f : α → ℝ) :
((∏ i ∈ s, f i : ℝ) : K) = ∏ i ∈ s, (f i : K) :=
map_prod (algebraMap ℝ K) _ _
#align is_R_or_C.of_real_prod RCLike.ofReal_prod
@[simp, rclike_simps, norm_cast]
theorem ofReal_finsupp_prod {α M : Type*} [Zero M] (f : α →₀ M) (g : α → M → ℝ) :
((f.prod fun a b => g a b : ℝ) : K) = f.prod fun a b => (g a b : K) :=
map_finsupp_prod _ f g
#align is_R_or_C.of_real_finsupp_prod RCLike.ofReal_finsupp_prod
@[simp, norm_cast, rclike_simps]
theorem real_smul_ofReal (r x : ℝ) : r • (x : K) = (r : K) * (x : K) :=
real_smul_eq_coe_mul _ _
#align is_R_or_C.real_smul_of_real RCLike.real_smul_ofReal
@[rclike_simps]
theorem re_ofReal_mul (r : ℝ) (z : K) : re (↑r * z) = r * re z := by
simp only [mul_re, ofReal_im, zero_mul, ofReal_re, sub_zero]
#align is_R_or_C.of_real_mul_re RCLike.re_ofReal_mul
@[rclike_simps]
theorem im_ofReal_mul (r : ℝ) (z : K) : im (↑r * z) = r * im z := by
simp only [add_zero, ofReal_im, zero_mul, ofReal_re, mul_im]
#align is_R_or_C.of_real_mul_im RCLike.im_ofReal_mul
@[rclike_simps]
theorem smul_re (r : ℝ) (z : K) : re (r • z) = r * re z := by
rw [real_smul_eq_coe_mul, re_ofReal_mul]
#align is_R_or_C.smul_re RCLike.smul_re
@[rclike_simps]
theorem smul_im (r : ℝ) (z : K) : im (r • z) = r * im z := by
rw [real_smul_eq_coe_mul, im_ofReal_mul]
#align is_R_or_C.smul_im RCLike.smul_im
@[simp, norm_cast, rclike_simps]
theorem norm_ofReal (r : ℝ) : ‖(r : K)‖ = |r| :=
norm_algebraMap' K r
#align is_R_or_C.norm_of_real RCLike.norm_ofReal
-- see Note [lower instance priority]
instance (priority := 100) charZero_rclike : CharZero K :=
(RingHom.charZero_iff (algebraMap ℝ K).injective).1 inferInstance
set_option linter.uppercaseLean3 false in
#align is_R_or_C.char_zero_R_or_C RCLike.charZero_rclike
@[simp, rclike_simps]
theorem I_re : re (I : K) = 0 :=
I_re_ax
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_re RCLike.I_re
@[simp, rclike_simps]
theorem I_im (z : K) : im z * im (I : K) = im z :=
mul_im_I_ax z
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_im RCLike.I_im
@[simp, rclike_simps]
theorem I_im' (z : K) : im (I : K) * im z = im z := by rw [mul_comm, I_im]
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_im' RCLike.I_im'
@[rclike_simps] -- porting note (#10618): was `simp`
theorem I_mul_re (z : K) : re (I * z) = -im z := by
simp only [I_re, zero_sub, I_im', zero_mul, mul_re]
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_mul_re RCLike.I_mul_re
theorem I_mul_I : (I : K) = 0 ∨ (I : K) * I = -1 :=
I_mul_I_ax
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_mul_I RCLike.I_mul_I
variable (𝕜) in
lemma I_eq_zero_or_im_I_eq_one : (I : K) = 0 ∨ im (I : K) = 1 :=
I_mul_I (K := K) |>.imp_right fun h ↦ by simpa [h] using (I_mul_re (I : K)).symm
@[simp, rclike_simps]
theorem conj_re (z : K) : re (conj z) = re z :=
RCLike.conj_re_ax z
#align is_R_or_C.conj_re RCLike.conj_re
@[simp, rclike_simps]
theorem conj_im (z : K) : im (conj z) = -im z :=
RCLike.conj_im_ax z
#align is_R_or_C.conj_im RCLike.conj_im
@[simp, rclike_simps]
theorem conj_I : conj (I : K) = -I :=
RCLike.conj_I_ax
set_option linter.uppercaseLean3 false in
#align is_R_or_C.conj_I RCLike.conj_I
@[simp, rclike_simps]
theorem conj_ofReal (r : ℝ) : conj (r : K) = (r : K) := by
rw [ext_iff]
simp only [ofReal_im, conj_im, eq_self_iff_true, conj_re, and_self_iff, neg_zero]
#align is_R_or_C.conj_of_real RCLike.conj_ofReal
-- replaced by `RCLike.conj_ofNat`
#noalign is_R_or_C.conj_bit0
#noalign is_R_or_C.conj_bit1
theorem conj_nat_cast (n : ℕ) : conj (n : K) = n := map_natCast _ _
-- See note [no_index around OfNat.ofNat]
theorem conj_ofNat (n : ℕ) [n.AtLeastTwo] : conj (no_index (OfNat.ofNat n : K)) = OfNat.ofNat n :=
map_ofNat _ _
@[rclike_simps] -- Porting note (#10618): was a `simp` but `simp` can prove it
theorem conj_neg_I : conj (-I) = (I : K) := by rw [map_neg, conj_I, neg_neg]
set_option linter.uppercaseLean3 false in
#align is_R_or_C.conj_neg_I RCLike.conj_neg_I
theorem conj_eq_re_sub_im (z : K) : conj z = re z - im z * I :=
(congr_arg conj (re_add_im z).symm).trans <| by
rw [map_add, map_mul, conj_I, conj_ofReal, conj_ofReal, mul_neg, sub_eq_add_neg]
#align is_R_or_C.conj_eq_re_sub_im RCLike.conj_eq_re_sub_im
theorem sub_conj (z : K) : z - conj z = 2 * im z * I :=
calc
z - conj z = re z + im z * I - (re z - im z * I) := by rw [re_add_im, ← conj_eq_re_sub_im]
_ = 2 * im z * I := by rw [add_sub_sub_cancel, ← two_mul, mul_assoc]
#align is_R_or_C.sub_conj RCLike.sub_conj
@[rclike_simps]
theorem conj_smul (r : ℝ) (z : K) : conj (r • z) = r • conj z := by
rw [conj_eq_re_sub_im, conj_eq_re_sub_im, smul_re, smul_im, ofReal_mul, ofReal_mul,
real_smul_eq_coe_mul r (_ - _), mul_sub, mul_assoc]
#align is_R_or_C.conj_smul RCLike.conj_smul
| Mathlib/Analysis/RCLike/Basic.lean | 374 | 377 | theorem add_conj (z : K) : z + conj z = 2 * re z :=
calc
z + conj z = re z + im z * I + (re z - im z * I) := by | rw [re_add_im, conj_eq_re_sub_im]
_ = 2 * re z := by rw [add_add_sub_cancel, two_mul]
|
import Mathlib.Computability.Encoding
import Mathlib.Logic.Small.List
import Mathlib.ModelTheory.Syntax
import Mathlib.SetTheory.Cardinal.Ordinal
#align_import model_theory.encoding from "leanprover-community/mathlib"@"91288e351d51b3f0748f0a38faa7613fb0ae2ada"
universe u v w u' v'
namespace FirstOrder
namespace Language
variable {L : Language.{u, v}}
variable {M : Type w} {N P : Type*} [L.Structure M] [L.Structure N] [L.Structure P]
variable {α : Type u'} {β : Type v'}
open FirstOrder Cardinal
open Computability List Structure Cardinal Fin
namespace Term
def listEncode : L.Term α → List (Sum α (Σi, L.Functions i))
| var i => [Sum.inl i]
| func f ts =>
Sum.inr (⟨_, f⟩ : Σi, L.Functions i)::(List.finRange _).bind fun i => (ts i).listEncode
#align first_order.language.term.list_encode FirstOrder.Language.Term.listEncode
def listDecode : List (Sum α (Σi, L.Functions i)) → List (Option (L.Term α))
| [] => []
| Sum.inl a::l => some (var a)::listDecode l
| Sum.inr ⟨n, f⟩::l =>
if h : ∀ i : Fin n, ((listDecode l).get? i).join.isSome then
(func f fun i => Option.get _ (h i))::(listDecode l).drop n
else [none]
#align first_order.language.term.list_decode FirstOrder.Language.Term.listDecode
theorem listDecode_encode_list (l : List (L.Term α)) :
listDecode (l.bind listEncode) = l.map Option.some := by
suffices h : ∀ (t : L.Term α) (l : List (Sum α (Σi, L.Functions i))),
listDecode (t.listEncode ++ l) = some t::listDecode l by
induction' l with t l lih
· rfl
· rw [cons_bind, h t (l.bind listEncode), lih, List.map]
intro t
induction' t with a n f ts ih <;> intro l
· rw [listEncode, singleton_append, listDecode]
· rw [listEncode, cons_append, listDecode]
have h : listDecode (((finRange n).bind fun i : Fin n => (ts i).listEncode) ++ l) =
(finRange n).map (Option.some ∘ ts) ++ listDecode l := by
induction' finRange n with i l' l'ih
· rfl
· rw [cons_bind, List.append_assoc, ih, map_cons, l'ih, cons_append, Function.comp]
have h' : ∀ i : Fin n,
(listDecode (((finRange n).bind fun i : Fin n => (ts i).listEncode) ++ l)).get? ↑i =
some (some (ts i)) := by
intro i
rw [h, get?_append, get?_map]
· simp only [Option.map_eq_some', Function.comp_apply, get?_eq_some]
refine ⟨i, ⟨lt_of_lt_of_le i.2 (ge_of_eq (length_finRange _)), ?_⟩, rfl⟩
rw [get_finRange, Fin.eta]
· refine lt_of_lt_of_le i.2 ?_
simp
refine (dif_pos fun i => Option.isSome_iff_exists.2 ⟨ts i, ?_⟩).trans ?_
· rw [Option.join_eq_some, h']
refine congr (congr rfl (congr rfl (congr rfl (funext fun i => Option.get_of_mem _ ?_)))) ?_
· simp [h']
· rw [h, drop_left']
rw [length_map, length_finRange]
#align first_order.language.term.list_decode_encode_list FirstOrder.Language.Term.listDecode_encode_list
@[simps]
protected def encoding : Encoding (L.Term α) where
Γ := Sum α (Σi, L.Functions i)
encode := listEncode
decode l := (listDecode l).head?.join
decode_encode t := by
have h := listDecode_encode_list [t]
rw [bind_singleton] at h
simp only [h, Option.join, head?, List.map, Option.some_bind, id]
#align first_order.language.term.encoding FirstOrder.Language.Term.encoding
theorem listEncode_injective :
Function.Injective (listEncode : L.Term α → List (Sum α (Σi, L.Functions i))) :=
Term.encoding.encode_injective
#align first_order.language.term.list_encode_injective FirstOrder.Language.Term.listEncode_injective
theorem card_le : #(L.Term α) ≤ max ℵ₀ #(Sum α (Σi, L.Functions i)) :=
lift_le.1 (_root_.trans Term.encoding.card_le_card_list (lift_le.2 (mk_list_le_max _)))
#align first_order.language.term.card_le FirstOrder.Language.Term.card_le
| Mathlib/ModelTheory/Encoding.lean | 122 | 151 | theorem card_sigma : #(Σn, L.Term (Sum α (Fin n))) = max ℵ₀ #(Sum α (Σi, L.Functions i)) := by |
refine le_antisymm ?_ ?_
· rw [mk_sigma]
refine (sum_le_iSup_lift _).trans ?_
rw [mk_nat, lift_aleph0, mul_eq_max_of_aleph0_le_left le_rfl, max_le_iff,
ciSup_le_iff' (bddAbove_range _)]
· refine ⟨le_max_left _ _, fun i => card_le.trans ?_⟩
refine max_le (le_max_left _ _) ?_
rw [← add_eq_max le_rfl, mk_sum, mk_sum, mk_sum, add_comm (Cardinal.lift #α), lift_add,
add_assoc, lift_lift, lift_lift, mk_fin, lift_natCast]
exact add_le_add_right (nat_lt_aleph0 _).le _
· rw [← one_le_iff_ne_zero]
refine _root_.trans ?_ (le_ciSup (bddAbove_range _) 1)
rw [one_le_iff_ne_zero, mk_ne_zero_iff]
exact ⟨var (Sum.inr 0)⟩
· rw [max_le_iff, ← infinite_iff]
refine ⟨Infinite.of_injective (fun i => ⟨i + 1, var (Sum.inr i)⟩) fun i j ij => ?_, ?_⟩
· cases ij
rfl
· rw [Cardinal.le_def]
refine ⟨⟨Sum.elim (fun i => ⟨0, var (Sum.inl i)⟩)
fun F => ⟨1, func F.2 fun _ => var (Sum.inr 0)⟩, ?_⟩⟩
rintro (a | a) (b | b) h
· simp only [Sum.elim_inl, Sigma.mk.inj_iff, heq_eq_eq, var.injEq, Sum.inl.injEq, true_and]
at h
rw [h]
· simp only [Sum.elim_inl, Sum.elim_inr, Sigma.mk.inj_iff, false_and] at h
· simp only [Sum.elim_inr, Sum.elim_inl, Sigma.mk.inj_iff, false_and] at h
· simp only [Sum.elim_inr, Sigma.mk.inj_iff, heq_eq_eq, func.injEq, true_and] at h
rw [Sigma.ext_iff.2 ⟨h.1, h.2.1⟩]
|
import Mathlib.Data.Set.Basic
open Function
universe u v
namespace Set
section Subsingleton
variable {α : Type u} {a : α} {s t : Set α}
protected def Subsingleton (s : Set α) : Prop :=
∀ ⦃x⦄ (_ : x ∈ s) ⦃y⦄ (_ : y ∈ s), x = y
#align set.subsingleton Set.Subsingleton
theorem Subsingleton.anti (ht : t.Subsingleton) (hst : s ⊆ t) : s.Subsingleton := fun _ hx _ hy =>
ht (hst hx) (hst hy)
#align set.subsingleton.anti Set.Subsingleton.anti
theorem Subsingleton.eq_singleton_of_mem (hs : s.Subsingleton) {x : α} (hx : x ∈ s) : s = {x} :=
ext fun _ => ⟨fun hy => hs hx hy ▸ mem_singleton _, fun hy => (eq_of_mem_singleton hy).symm ▸ hx⟩
#align set.subsingleton.eq_singleton_of_mem Set.Subsingleton.eq_singleton_of_mem
@[simp]
theorem subsingleton_empty : (∅ : Set α).Subsingleton := fun _ => False.elim
#align set.subsingleton_empty Set.subsingleton_empty
@[simp]
theorem subsingleton_singleton {a} : ({a} : Set α).Subsingleton := fun _ hx _ hy =>
(eq_of_mem_singleton hx).symm ▸ (eq_of_mem_singleton hy).symm ▸ rfl
#align set.subsingleton_singleton Set.subsingleton_singleton
theorem subsingleton_of_subset_singleton (h : s ⊆ {a}) : s.Subsingleton :=
subsingleton_singleton.anti h
#align set.subsingleton_of_subset_singleton Set.subsingleton_of_subset_singleton
theorem subsingleton_of_forall_eq (a : α) (h : ∀ b ∈ s, b = a) : s.Subsingleton := fun _ hb _ hc =>
(h _ hb).trans (h _ hc).symm
#align set.subsingleton_of_forall_eq Set.subsingleton_of_forall_eq
theorem subsingleton_iff_singleton {x} (hx : x ∈ s) : s.Subsingleton ↔ s = {x} :=
⟨fun h => h.eq_singleton_of_mem hx, fun h => h.symm ▸ subsingleton_singleton⟩
#align set.subsingleton_iff_singleton Set.subsingleton_iff_singleton
theorem Subsingleton.eq_empty_or_singleton (hs : s.Subsingleton) : s = ∅ ∨ ∃ x, s = {x} :=
s.eq_empty_or_nonempty.elim Or.inl fun ⟨x, hx⟩ => Or.inr ⟨x, hs.eq_singleton_of_mem hx⟩
#align set.subsingleton.eq_empty_or_singleton Set.Subsingleton.eq_empty_or_singleton
theorem Subsingleton.induction_on {p : Set α → Prop} (hs : s.Subsingleton) (he : p ∅)
(h₁ : ∀ x, p {x}) : p s := by
rcases hs.eq_empty_or_singleton with (rfl | ⟨x, rfl⟩)
exacts [he, h₁ _]
#align set.subsingleton.induction_on Set.Subsingleton.induction_on
theorem subsingleton_univ [Subsingleton α] : (univ : Set α).Subsingleton := fun x _ y _ =>
Subsingleton.elim x y
#align set.subsingleton_univ Set.subsingleton_univ
theorem subsingleton_of_univ_subsingleton (h : (univ : Set α).Subsingleton) : Subsingleton α :=
⟨fun a b => h (mem_univ a) (mem_univ b)⟩
#align set.subsingleton_of_univ_subsingleton Set.subsingleton_of_univ_subsingleton
@[simp]
theorem subsingleton_univ_iff : (univ : Set α).Subsingleton ↔ Subsingleton α :=
⟨subsingleton_of_univ_subsingleton, fun h => @subsingleton_univ _ h⟩
#align set.subsingleton_univ_iff Set.subsingleton_univ_iff
theorem subsingleton_of_subsingleton [Subsingleton α] {s : Set α} : Set.Subsingleton s :=
subsingleton_univ.anti (subset_univ s)
#align set.subsingleton_of_subsingleton Set.subsingleton_of_subsingleton
theorem subsingleton_isTop (α : Type*) [PartialOrder α] : Set.Subsingleton { x : α | IsTop x } :=
fun x hx _ hy => hx.isMax.eq_of_le (hy x)
#align set.subsingleton_is_top Set.subsingleton_isTop
theorem subsingleton_isBot (α : Type*) [PartialOrder α] : Set.Subsingleton { x : α | IsBot x } :=
fun x hx _ hy => hx.isMin.eq_of_ge (hy x)
#align set.subsingleton_is_bot Set.subsingleton_isBot
| Mathlib/Data/Set/Subsingleton.lean | 99 | 104 | theorem exists_eq_singleton_iff_nonempty_subsingleton :
(∃ a : α, s = {a}) ↔ s.Nonempty ∧ s.Subsingleton := by |
refine ⟨?_, fun h => ?_⟩
· rintro ⟨a, rfl⟩
exact ⟨singleton_nonempty a, subsingleton_singleton⟩
· exact h.2.eq_empty_or_singleton.resolve_left h.1.ne_empty
|
import Mathlib.Dynamics.Ergodic.MeasurePreserving
import Mathlib.LinearAlgebra.Determinant
import Mathlib.LinearAlgebra.Matrix.Diagonal
import Mathlib.LinearAlgebra.Matrix.Transvection
import Mathlib.MeasureTheory.Group.LIntegral
import Mathlib.MeasureTheory.Integral.Marginal
import Mathlib.MeasureTheory.Measure.Stieltjes
import Mathlib.MeasureTheory.Measure.Haar.OfBasis
#align_import measure_theory.measure.lebesgue.basic from "leanprover-community/mathlib"@"fd5edc43dc4f10b85abfe544b88f82cf13c5f844"
assert_not_exists MeasureTheory.integral
noncomputable section
open scoped Classical
open Set Filter MeasureTheory MeasureTheory.Measure TopologicalSpace
open ENNReal (ofReal)
open scoped ENNReal NNReal Topology
namespace Real
variable {ι : Type*} [Fintype ι]
theorem volume_eq_stieltjes_id : (volume : Measure ℝ) = StieltjesFunction.id.measure := by
haveI : IsAddLeftInvariant StieltjesFunction.id.measure :=
⟨fun a =>
Eq.symm <|
Real.measure_ext_Ioo_rat fun p q => by
simp only [Measure.map_apply (measurable_const_add a) measurableSet_Ioo,
sub_sub_sub_cancel_right, StieltjesFunction.measure_Ioo, StieltjesFunction.id_leftLim,
StieltjesFunction.id_apply, id, preimage_const_add_Ioo]⟩
have A : StieltjesFunction.id.measure (stdOrthonormalBasis ℝ ℝ).toBasis.parallelepiped = 1 := by
change StieltjesFunction.id.measure (parallelepiped (stdOrthonormalBasis ℝ ℝ)) = 1
rcases parallelepiped_orthonormalBasis_one_dim (stdOrthonormalBasis ℝ ℝ) with (H | H) <;>
simp only [H, StieltjesFunction.measure_Icc, StieltjesFunction.id_apply, id, tsub_zero,
StieltjesFunction.id_leftLim, sub_neg_eq_add, zero_add, ENNReal.ofReal_one]
conv_rhs =>
rw [addHaarMeasure_unique StieltjesFunction.id.measure
(stdOrthonormalBasis ℝ ℝ).toBasis.parallelepiped, A]
simp only [volume, Basis.addHaar, one_smul]
#align real.volume_eq_stieltjes_id Real.volume_eq_stieltjes_id
theorem volume_val (s) : volume s = StieltjesFunction.id.measure s := by
simp [volume_eq_stieltjes_id]
#align real.volume_val Real.volume_val
@[simp]
theorem volume_Ico {a b : ℝ} : volume (Ico a b) = ofReal (b - a) := by simp [volume_val]
#align real.volume_Ico Real.volume_Ico
@[simp]
theorem volume_Icc {a b : ℝ} : volume (Icc a b) = ofReal (b - a) := by simp [volume_val]
#align real.volume_Icc Real.volume_Icc
@[simp]
theorem volume_Ioo {a b : ℝ} : volume (Ioo a b) = ofReal (b - a) := by simp [volume_val]
#align real.volume_Ioo Real.volume_Ioo
@[simp]
theorem volume_Ioc {a b : ℝ} : volume (Ioc a b) = ofReal (b - a) := by simp [volume_val]
#align real.volume_Ioc Real.volume_Ioc
-- @[simp] -- Porting note (#10618): simp can prove this
| Mathlib/MeasureTheory/Measure/Lebesgue/Basic.lean | 96 | 96 | theorem volume_singleton {a : ℝ} : volume ({a} : Set ℝ) = 0 := by | simp [volume_val]
|
import Mathlib.LinearAlgebra.Dimension.Finite
import Mathlib.LinearAlgebra.Dimension.Constructions
open Cardinal Submodule Set FiniteDimensional
universe u v
namespace Subalgebra
variable {F E : Type*} [CommRing F] [StrongRankCondition F] [Ring E] [Algebra F E]
{S : Subalgebra F E}
theorem eq_bot_of_rank_le_one (h : Module.rank F S ≤ 1) [Module.Free F S] : S = ⊥ := by
nontriviality E
obtain ⟨κ, b⟩ := Module.Free.exists_basis (R := F) (M := S)
by_cases h1 : Module.rank F S = 1
· refine bot_unique fun x hx ↦ Algebra.mem_bot.2 ?_
rw [← b.mk_eq_rank'', eq_one_iff_unique, ← unique_iff_subsingleton_and_nonempty] at h1
obtain ⟨h1⟩ := h1
obtain ⟨y, hy⟩ := (bijective_algebraMap_of_linearEquiv (b.repr ≪≫ₗ
Finsupp.LinearEquiv.finsuppUnique _ _ _).symm).surjective ⟨x, hx⟩
exact ⟨y, congr(Subtype.val $(hy))⟩
haveI := mk_eq_zero_iff.1 (b.mk_eq_rank''.symm ▸ lt_one_iff_zero.1 (h.lt_of_ne h1))
haveI := b.repr.toEquiv.subsingleton
exact False.elim <| one_ne_zero congr(S.val $(Subsingleton.elim 1 0))
#align subalgebra.eq_bot_of_rank_le_one Subalgebra.eq_bot_of_rank_le_one
theorem eq_bot_of_finrank_one (h : finrank F S = 1) [Module.Free F S] : S = ⊥ := by
refine Subalgebra.eq_bot_of_rank_le_one ?_
rw [finrank, toNat_eq_one] at h
rw [h]
#align subalgebra.eq_bot_of_finrank_one Subalgebra.eq_bot_of_finrank_one
@[simp]
| Mathlib/LinearAlgebra/Dimension/FreeAndStrongRankCondition.lean | 284 | 295 | theorem rank_eq_one_iff [Nontrivial E] [Module.Free F S] : Module.rank F S = 1 ↔ S = ⊥ := by |
refine ⟨fun h ↦ Subalgebra.eq_bot_of_rank_le_one h.le, ?_⟩
rintro rfl
obtain ⟨κ, b⟩ := Module.Free.exists_basis (R := F) (M := (⊥ : Subalgebra F E))
refine le_antisymm ?_ ?_
· have := lift_rank_range_le (Algebra.linearMap F E)
rwa [← one_eq_range, rank_self, lift_one, lift_le_one_iff] at this
· by_contra H
rw [not_le, lt_one_iff_zero] at H
haveI := mk_eq_zero_iff.1 (H ▸ b.mk_eq_rank'')
haveI := b.repr.toEquiv.subsingleton
exact one_ne_zero congr((⊥ : Subalgebra F E).val $(Subsingleton.elim 1 0))
|
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]
theorem isClosed_compl_iff {s : Set X} : IsClosed sᶜ ↔ IsOpen s := by
rw [← isOpen_compl_iff, compl_compl]
#align is_closed_compl_iff isClosed_compl_iff
alias ⟨_, IsOpen.isClosed_compl⟩ := isClosed_compl_iff
#align is_open.is_closed_compl IsOpen.isClosed_compl
theorem IsOpen.sdiff (h₁ : IsOpen s) (h₂ : IsClosed t) : IsOpen (s \ t) :=
IsOpen.inter h₁ h₂.isOpen_compl
#align is_open.sdiff IsOpen.sdiff
theorem IsClosed.inter (h₁ : IsClosed s₁) (h₂ : IsClosed s₂) : IsClosed (s₁ ∩ s₂) := by
rw [← isOpen_compl_iff] at *
rw [compl_inter]
exact IsOpen.union h₁ h₂
#align is_closed.inter IsClosed.inter
theorem IsClosed.sdiff (h₁ : IsClosed s) (h₂ : IsOpen t) : IsClosed (s \ t) :=
IsClosed.inter h₁ (isClosed_compl_iff.mpr h₂)
#align is_closed.sdiff IsClosed.sdiff
theorem Set.Finite.isClosed_biUnion {s : Set α} {f : α → Set X} (hs : s.Finite)
(h : ∀ i ∈ s, IsClosed (f i)) :
IsClosed (⋃ i ∈ s, f i) := by
simp only [← isOpen_compl_iff, compl_iUnion] at *
exact hs.isOpen_biInter h
#align is_closed_bUnion Set.Finite.isClosed_biUnion
lemma isClosed_biUnion_finset {s : Finset α} {f : α → Set X} (h : ∀ i ∈ s, IsClosed (f i)) :
IsClosed (⋃ i ∈ s, f i) :=
s.finite_toSet.isClosed_biUnion h
theorem isClosed_iUnion_of_finite [Finite ι] {s : ι → Set X} (h : ∀ i, IsClosed (s i)) :
IsClosed (⋃ i, s i) := by
simp only [← isOpen_compl_iff, compl_iUnion] at *
exact isOpen_iInter_of_finite h
#align is_closed_Union isClosed_iUnion_of_finite
theorem isClosed_imp {p q : X → Prop} (hp : IsOpen { x | p x }) (hq : IsClosed { x | q x }) :
IsClosed { x | p x → q x } := by
simpa only [imp_iff_not_or] using hp.isClosed_compl.union hq
#align is_closed_imp isClosed_imp
theorem IsClosed.not : IsClosed { a | p a } → IsOpen { a | ¬p a } :=
isOpen_compl_iff.mpr
#align is_closed.not IsClosed.not
theorem mem_interior : x ∈ interior s ↔ ∃ t ⊆ s, IsOpen t ∧ x ∈ t := by
simp only [interior, mem_sUnion, mem_setOf_eq, and_assoc, and_left_comm]
#align mem_interior mem_interiorₓ
@[simp]
theorem isOpen_interior : IsOpen (interior s) :=
isOpen_sUnion fun _ => And.left
#align is_open_interior isOpen_interior
theorem interior_subset : interior s ⊆ s :=
sUnion_subset fun _ => And.right
#align interior_subset interior_subset
theorem interior_maximal (h₁ : t ⊆ s) (h₂ : IsOpen t) : t ⊆ interior s :=
subset_sUnion_of_mem ⟨h₂, h₁⟩
#align interior_maximal interior_maximal
theorem IsOpen.interior_eq (h : IsOpen s) : interior s = s :=
interior_subset.antisymm (interior_maximal (Subset.refl s) h)
#align is_open.interior_eq IsOpen.interior_eq
theorem interior_eq_iff_isOpen : interior s = s ↔ IsOpen s :=
⟨fun h => h ▸ isOpen_interior, IsOpen.interior_eq⟩
#align interior_eq_iff_is_open interior_eq_iff_isOpen
theorem subset_interior_iff_isOpen : s ⊆ interior s ↔ IsOpen s := by
simp only [interior_eq_iff_isOpen.symm, Subset.antisymm_iff, interior_subset, true_and]
#align subset_interior_iff_is_open subset_interior_iff_isOpen
theorem IsOpen.subset_interior_iff (h₁ : IsOpen s) : s ⊆ interior t ↔ s ⊆ t :=
⟨fun h => Subset.trans h interior_subset, fun h₂ => interior_maximal h₂ h₁⟩
#align is_open.subset_interior_iff IsOpen.subset_interior_iff
theorem subset_interior_iff : t ⊆ interior s ↔ ∃ U, IsOpen U ∧ t ⊆ U ∧ U ⊆ s :=
⟨fun h => ⟨interior s, isOpen_interior, h, interior_subset⟩, fun ⟨_U, hU, htU, hUs⟩ =>
htU.trans (interior_maximal hUs hU)⟩
#align subset_interior_iff subset_interior_iff
lemma interior_subset_iff : interior s ⊆ t ↔ ∀ U, IsOpen U → U ⊆ s → U ⊆ t := by
simp [interior]
@[mono, gcongr]
theorem interior_mono (h : s ⊆ t) : interior s ⊆ interior t :=
interior_maximal (Subset.trans interior_subset h) isOpen_interior
#align interior_mono interior_mono
@[simp]
theorem interior_empty : interior (∅ : Set X) = ∅ :=
isOpen_empty.interior_eq
#align interior_empty interior_empty
@[simp]
theorem interior_univ : interior (univ : Set X) = univ :=
isOpen_univ.interior_eq
#align interior_univ interior_univ
@[simp]
theorem interior_eq_univ : interior s = univ ↔ s = univ :=
⟨fun h => univ_subset_iff.mp <| h.symm.trans_le interior_subset, fun h => h.symm ▸ interior_univ⟩
#align interior_eq_univ interior_eq_univ
@[simp]
theorem interior_interior : interior (interior s) = interior s :=
isOpen_interior.interior_eq
#align interior_interior interior_interior
@[simp]
theorem interior_inter : interior (s ∩ t) = interior s ∩ interior t :=
(Monotone.map_inf_le (fun _ _ ↦ interior_mono) s t).antisymm <|
interior_maximal (inter_subset_inter interior_subset interior_subset) <|
isOpen_interior.inter isOpen_interior
#align interior_inter interior_inter
theorem Set.Finite.interior_biInter {ι : Type*} {s : Set ι} (hs : s.Finite) (f : ι → Set X) :
interior (⋂ i ∈ s, f i) = ⋂ i ∈ s, interior (f i) :=
hs.induction_on (by simp) <| by intros; simp [*]
theorem Set.Finite.interior_sInter {S : Set (Set X)} (hS : S.Finite) :
interior (⋂₀ S) = ⋂ s ∈ S, interior s := by
rw [sInter_eq_biInter, hS.interior_biInter]
@[simp]
theorem Finset.interior_iInter {ι : Type*} (s : Finset ι) (f : ι → Set X) :
interior (⋂ i ∈ s, f i) = ⋂ i ∈ s, interior (f i) :=
s.finite_toSet.interior_biInter f
#align finset.interior_Inter Finset.interior_iInter
@[simp]
theorem interior_iInter_of_finite [Finite ι] (f : ι → Set X) :
interior (⋂ i, f i) = ⋂ i, interior (f i) := by
rw [← sInter_range, (finite_range f).interior_sInter, biInter_range]
#align interior_Inter interior_iInter_of_finite
theorem interior_union_isClosed_of_interior_empty (h₁ : IsClosed s)
(h₂ : interior t = ∅) : interior (s ∪ t) = interior s :=
have : interior (s ∪ t) ⊆ s := fun x ⟨u, ⟨(hu₁ : IsOpen u), (hu₂ : u ⊆ s ∪ t)⟩, (hx₁ : x ∈ u)⟩ =>
by_contradiction fun hx₂ : x ∉ s =>
have : u \ s ⊆ t := fun x ⟨h₁, h₂⟩ => Or.resolve_left (hu₂ h₁) h₂
have : u \ s ⊆ interior t := by rwa [(IsOpen.sdiff hu₁ h₁).subset_interior_iff]
have : u \ s ⊆ ∅ := by rwa [h₂] at this
this ⟨hx₁, hx₂⟩
Subset.antisymm (interior_maximal this isOpen_interior) (interior_mono subset_union_left)
#align interior_union_is_closed_of_interior_empty interior_union_isClosed_of_interior_empty
theorem isOpen_iff_forall_mem_open : IsOpen s ↔ ∀ x ∈ s, ∃ t, t ⊆ s ∧ IsOpen t ∧ x ∈ t := by
rw [← subset_interior_iff_isOpen]
simp only [subset_def, mem_interior]
#align is_open_iff_forall_mem_open isOpen_iff_forall_mem_open
theorem interior_iInter_subset (s : ι → Set X) : interior (⋂ i, s i) ⊆ ⋂ i, interior (s i) :=
subset_iInter fun _ => interior_mono <| iInter_subset _ _
#align interior_Inter_subset interior_iInter_subset
theorem interior_iInter₂_subset (p : ι → Sort*) (s : ∀ i, p i → Set X) :
interior (⋂ (i) (j), s i j) ⊆ ⋂ (i) (j), interior (s i j) :=
(interior_iInter_subset _).trans <| iInter_mono fun _ => interior_iInter_subset _
#align interior_Inter₂_subset interior_iInter₂_subset
theorem interior_sInter_subset (S : Set (Set X)) : interior (⋂₀ S) ⊆ ⋂ s ∈ S, interior s :=
calc
interior (⋂₀ S) = interior (⋂ s ∈ S, s) := by rw [sInter_eq_biInter]
_ ⊆ ⋂ s ∈ S, interior s := interior_iInter₂_subset _ _
#align interior_sInter_subset interior_sInter_subset
theorem Filter.HasBasis.lift'_interior {l : Filter X} {p : ι → Prop} {s : ι → Set X}
(h : l.HasBasis p s) : (l.lift' interior).HasBasis p fun i => interior (s i) :=
h.lift' fun _ _ ↦ interior_mono
theorem Filter.lift'_interior_le (l : Filter X) : l.lift' interior ≤ l := fun _s hs ↦
mem_of_superset (mem_lift' hs) interior_subset
theorem Filter.HasBasis.lift'_interior_eq_self {l : Filter X} {p : ι → Prop} {s : ι → Set X}
(h : l.HasBasis p s) (ho : ∀ i, p i → IsOpen (s i)) : l.lift' interior = l :=
le_antisymm l.lift'_interior_le <| h.lift'_interior.ge_iff.2 fun i hi ↦ by
simpa only [(ho i hi).interior_eq] using h.mem_of_mem hi
@[simp]
theorem isClosed_closure : IsClosed (closure s) :=
isClosed_sInter fun _ => And.left
#align is_closed_closure isClosed_closure
theorem subset_closure : s ⊆ closure s :=
subset_sInter fun _ => And.right
#align subset_closure subset_closure
theorem not_mem_of_not_mem_closure {P : X} (hP : P ∉ closure s) : P ∉ s := fun h =>
hP (subset_closure h)
#align not_mem_of_not_mem_closure not_mem_of_not_mem_closure
theorem closure_minimal (h₁ : s ⊆ t) (h₂ : IsClosed t) : closure s ⊆ t :=
sInter_subset_of_mem ⟨h₂, h₁⟩
#align closure_minimal closure_minimal
theorem Disjoint.closure_left (hd : Disjoint s t) (ht : IsOpen t) :
Disjoint (closure s) t :=
disjoint_compl_left.mono_left <| closure_minimal hd.subset_compl_right ht.isClosed_compl
#align disjoint.closure_left Disjoint.closure_left
theorem Disjoint.closure_right (hd : Disjoint s t) (hs : IsOpen s) :
Disjoint s (closure t) :=
(hd.symm.closure_left hs).symm
#align disjoint.closure_right Disjoint.closure_right
theorem IsClosed.closure_eq (h : IsClosed s) : closure s = s :=
Subset.antisymm (closure_minimal (Subset.refl s) h) subset_closure
#align is_closed.closure_eq IsClosed.closure_eq
theorem IsClosed.closure_subset (hs : IsClosed s) : closure s ⊆ s :=
closure_minimal (Subset.refl _) hs
#align is_closed.closure_subset IsClosed.closure_subset
theorem IsClosed.closure_subset_iff (h₁ : IsClosed t) : closure s ⊆ t ↔ s ⊆ t :=
⟨Subset.trans subset_closure, fun h => closure_minimal h h₁⟩
#align is_closed.closure_subset_iff IsClosed.closure_subset_iff
theorem IsClosed.mem_iff_closure_subset (hs : IsClosed s) :
x ∈ s ↔ closure ({x} : Set X) ⊆ s :=
(hs.closure_subset_iff.trans Set.singleton_subset_iff).symm
#align is_closed.mem_iff_closure_subset IsClosed.mem_iff_closure_subset
@[mono, gcongr]
theorem closure_mono (h : s ⊆ t) : closure s ⊆ closure t :=
closure_minimal (Subset.trans h subset_closure) isClosed_closure
#align closure_mono closure_mono
theorem monotone_closure (X : Type*) [TopologicalSpace X] : Monotone (@closure X _) := fun _ _ =>
closure_mono
#align monotone_closure monotone_closure
theorem diff_subset_closure_iff : s \ t ⊆ closure t ↔ s ⊆ closure t := by
rw [diff_subset_iff, union_eq_self_of_subset_left subset_closure]
#align diff_subset_closure_iff diff_subset_closure_iff
theorem closure_inter_subset_inter_closure (s t : Set X) :
closure (s ∩ t) ⊆ closure s ∩ closure t :=
(monotone_closure X).map_inf_le s t
#align closure_inter_subset_inter_closure closure_inter_subset_inter_closure
theorem isClosed_of_closure_subset (h : closure s ⊆ s) : IsClosed s := by
rw [subset_closure.antisymm h]; exact isClosed_closure
#align is_closed_of_closure_subset isClosed_of_closure_subset
theorem closure_eq_iff_isClosed : closure s = s ↔ IsClosed s :=
⟨fun h => h ▸ isClosed_closure, IsClosed.closure_eq⟩
#align closure_eq_iff_is_closed closure_eq_iff_isClosed
theorem closure_subset_iff_isClosed : closure s ⊆ s ↔ IsClosed s :=
⟨isClosed_of_closure_subset, IsClosed.closure_subset⟩
#align closure_subset_iff_is_closed closure_subset_iff_isClosed
@[simp]
theorem closure_empty : closure (∅ : Set X) = ∅ :=
isClosed_empty.closure_eq
#align closure_empty closure_empty
@[simp]
theorem closure_empty_iff (s : Set X) : closure s = ∅ ↔ s = ∅ :=
⟨subset_eq_empty subset_closure, fun h => h.symm ▸ closure_empty⟩
#align closure_empty_iff closure_empty_iff
@[simp]
theorem closure_nonempty_iff : (closure s).Nonempty ↔ s.Nonempty := by
simp only [nonempty_iff_ne_empty, Ne, closure_empty_iff]
#align closure_nonempty_iff closure_nonempty_iff
alias ⟨Set.Nonempty.of_closure, Set.Nonempty.closure⟩ := closure_nonempty_iff
#align set.nonempty.of_closure Set.Nonempty.of_closure
#align set.nonempty.closure Set.Nonempty.closure
@[simp]
theorem closure_univ : closure (univ : Set X) = univ :=
isClosed_univ.closure_eq
#align closure_univ closure_univ
@[simp]
theorem closure_closure : closure (closure s) = closure s :=
isClosed_closure.closure_eq
#align closure_closure closure_closure
theorem closure_eq_compl_interior_compl : closure s = (interior sᶜ)ᶜ := by
rw [interior, closure, compl_sUnion, compl_image_set_of]
simp only [compl_subset_compl, isOpen_compl_iff]
#align closure_eq_compl_interior_compl closure_eq_compl_interior_compl
@[simp]
theorem closure_union : closure (s ∪ t) = closure s ∪ closure t := by
simp [closure_eq_compl_interior_compl, compl_inter]
#align closure_union closure_union
theorem Set.Finite.closure_biUnion {ι : Type*} {s : Set ι} (hs : s.Finite) (f : ι → Set X) :
closure (⋃ i ∈ s, f i) = ⋃ i ∈ s, closure (f i) := by
simp [closure_eq_compl_interior_compl, hs.interior_biInter]
theorem Set.Finite.closure_sUnion {S : Set (Set X)} (hS : S.Finite) :
closure (⋃₀ S) = ⋃ s ∈ S, closure s := by
rw [sUnion_eq_biUnion, hS.closure_biUnion]
@[simp]
theorem Finset.closure_biUnion {ι : Type*} (s : Finset ι) (f : ι → Set X) :
closure (⋃ i ∈ s, f i) = ⋃ i ∈ s, closure (f i) :=
s.finite_toSet.closure_biUnion f
#align finset.closure_bUnion Finset.closure_biUnion
@[simp]
theorem closure_iUnion_of_finite [Finite ι] (f : ι → Set X) :
closure (⋃ i, f i) = ⋃ i, closure (f i) := by
rw [← sUnion_range, (finite_range _).closure_sUnion, biUnion_range]
#align closure_Union closure_iUnion_of_finite
theorem interior_subset_closure : interior s ⊆ closure s :=
Subset.trans interior_subset subset_closure
#align interior_subset_closure interior_subset_closure
@[simp]
theorem interior_compl : interior sᶜ = (closure s)ᶜ := by
simp [closure_eq_compl_interior_compl]
#align interior_compl interior_compl
@[simp]
theorem closure_compl : closure sᶜ = (interior s)ᶜ := by
simp [closure_eq_compl_interior_compl]
#align closure_compl closure_compl
theorem mem_closure_iff :
x ∈ closure s ↔ ∀ o, IsOpen o → x ∈ o → (o ∩ s).Nonempty :=
⟨fun h o oo ao =>
by_contradiction fun os =>
have : s ⊆ oᶜ := fun x xs xo => os ⟨x, xo, xs⟩
closure_minimal this (isClosed_compl_iff.2 oo) h ao,
fun H _ ⟨h₁, h₂⟩ =>
by_contradiction fun nc =>
let ⟨_, hc, hs⟩ := H _ h₁.isOpen_compl nc
hc (h₂ hs)⟩
#align mem_closure_iff mem_closure_iff
theorem closure_inter_open_nonempty_iff (h : IsOpen t) :
(closure s ∩ t).Nonempty ↔ (s ∩ t).Nonempty :=
⟨fun ⟨_x, hxcs, hxt⟩ => inter_comm t s ▸ mem_closure_iff.1 hxcs t h hxt, fun h =>
h.mono <| inf_le_inf_right t subset_closure⟩
#align closure_inter_open_nonempty_iff closure_inter_open_nonempty_iff
theorem Filter.le_lift'_closure (l : Filter X) : l ≤ l.lift' closure :=
le_lift'.2 fun _ h => mem_of_superset h subset_closure
#align filter.le_lift'_closure Filter.le_lift'_closure
theorem Filter.HasBasis.lift'_closure {l : Filter X} {p : ι → Prop} {s : ι → Set X}
(h : l.HasBasis p s) : (l.lift' closure).HasBasis p fun i => closure (s i) :=
h.lift' (monotone_closure X)
#align filter.has_basis.lift'_closure Filter.HasBasis.lift'_closure
theorem Filter.HasBasis.lift'_closure_eq_self {l : Filter X} {p : ι → Prop} {s : ι → Set X}
(h : l.HasBasis p s) (hc : ∀ i, p i → IsClosed (s i)) : l.lift' closure = l :=
le_antisymm (h.ge_iff.2 fun i hi => (hc i hi).closure_eq ▸ mem_lift' (h.mem_of_mem hi))
l.le_lift'_closure
#align filter.has_basis.lift'_closure_eq_self Filter.HasBasis.lift'_closure_eq_self
@[simp]
theorem Filter.lift'_closure_eq_bot {l : Filter X} : l.lift' closure = ⊥ ↔ l = ⊥ :=
⟨fun h => bot_unique <| h ▸ l.le_lift'_closure, fun h =>
h.symm ▸ by rw [lift'_bot (monotone_closure _), closure_empty, principal_empty]⟩
#align filter.lift'_closure_eq_bot Filter.lift'_closure_eq_bot
theorem dense_iff_closure_eq : Dense s ↔ closure s = univ :=
eq_univ_iff_forall.symm
#align dense_iff_closure_eq dense_iff_closure_eq
alias ⟨Dense.closure_eq, _⟩ := dense_iff_closure_eq
#align dense.closure_eq Dense.closure_eq
theorem interior_eq_empty_iff_dense_compl : interior s = ∅ ↔ Dense sᶜ := by
rw [dense_iff_closure_eq, closure_compl, compl_univ_iff]
#align interior_eq_empty_iff_dense_compl interior_eq_empty_iff_dense_compl
theorem Dense.interior_compl (h : Dense s) : interior sᶜ = ∅ :=
interior_eq_empty_iff_dense_compl.2 <| by rwa [compl_compl]
#align dense.interior_compl Dense.interior_compl
@[simp]
theorem dense_closure : Dense (closure s) ↔ Dense s := by
rw [Dense, Dense, closure_closure]
#align dense_closure dense_closure
protected alias ⟨_, Dense.closure⟩ := dense_closure
alias ⟨Dense.of_closure, _⟩ := dense_closure
#align dense.of_closure Dense.of_closure
#align dense.closure Dense.closure
@[simp]
theorem dense_univ : Dense (univ : Set X) := fun _ => subset_closure trivial
#align dense_univ dense_univ
theorem dense_iff_inter_open :
Dense s ↔ ∀ U, IsOpen U → U.Nonempty → (U ∩ s).Nonempty := by
constructor <;> intro h
· rintro U U_op ⟨x, x_in⟩
exact mem_closure_iff.1 (h _) U U_op x_in
· intro x
rw [mem_closure_iff]
intro U U_op x_in
exact h U U_op ⟨_, x_in⟩
#align dense_iff_inter_open dense_iff_inter_open
alias ⟨Dense.inter_open_nonempty, _⟩ := dense_iff_inter_open
#align dense.inter_open_nonempty Dense.inter_open_nonempty
theorem Dense.exists_mem_open (hs : Dense s) {U : Set X} (ho : IsOpen U)
(hne : U.Nonempty) : ∃ x ∈ s, x ∈ U :=
let ⟨x, hx⟩ := hs.inter_open_nonempty U ho hne
⟨x, hx.2, hx.1⟩
#align dense.exists_mem_open Dense.exists_mem_open
theorem Dense.nonempty_iff (hs : Dense s) : s.Nonempty ↔ Nonempty X :=
⟨fun ⟨x, _⟩ => ⟨x⟩, fun ⟨x⟩ =>
let ⟨y, hy⟩ := hs.inter_open_nonempty _ isOpen_univ ⟨x, trivial⟩
⟨y, hy.2⟩⟩
#align dense.nonempty_iff Dense.nonempty_iff
theorem Dense.nonempty [h : Nonempty X] (hs : Dense s) : s.Nonempty :=
hs.nonempty_iff.2 h
#align dense.nonempty Dense.nonempty
@[mono]
theorem Dense.mono (h : s₁ ⊆ s₂) (hd : Dense s₁) : Dense s₂ := fun x =>
closure_mono h (hd x)
#align dense.mono Dense.mono
theorem dense_compl_singleton_iff_not_open :
Dense ({x}ᶜ : Set X) ↔ ¬IsOpen ({x} : Set X) := by
constructor
· intro hd ho
exact (hd.inter_open_nonempty _ ho (singleton_nonempty _)).ne_empty (inter_compl_self _)
· refine fun ho => dense_iff_inter_open.2 fun U hU hne => inter_compl_nonempty_iff.2 fun hUx => ?_
obtain rfl : U = {x} := eq_singleton_iff_nonempty_unique_mem.2 ⟨hne, hUx⟩
exact ho hU
#align dense_compl_singleton_iff_not_open dense_compl_singleton_iff_not_open
@[simp]
theorem closure_diff_interior (s : Set X) : closure s \ interior s = frontier s :=
rfl
#align closure_diff_interior closure_diff_interior
lemma disjoint_interior_frontier : Disjoint (interior s) (frontier s) := by
rw [disjoint_iff_inter_eq_empty, ← closure_diff_interior, diff_eq,
← inter_assoc, inter_comm, ← inter_assoc, compl_inter_self, empty_inter]
@[simp]
theorem closure_diff_frontier (s : Set X) : closure s \ frontier s = interior s := by
rw [frontier, diff_diff_right_self, inter_eq_self_of_subset_right interior_subset_closure]
#align closure_diff_frontier closure_diff_frontier
@[simp]
theorem self_diff_frontier (s : Set X) : s \ frontier s = interior s := by
rw [frontier, diff_diff_right, diff_eq_empty.2 subset_closure,
inter_eq_self_of_subset_right interior_subset, empty_union]
#align self_diff_frontier self_diff_frontier
theorem frontier_eq_closure_inter_closure : frontier s = closure s ∩ closure sᶜ := by
rw [closure_compl, frontier, diff_eq]
#align frontier_eq_closure_inter_closure frontier_eq_closure_inter_closure
theorem frontier_subset_closure : frontier s ⊆ closure s :=
diff_subset
#align frontier_subset_closure frontier_subset_closure
theorem IsClosed.frontier_subset (hs : IsClosed s) : frontier s ⊆ s :=
frontier_subset_closure.trans hs.closure_eq.subset
#align is_closed.frontier_subset IsClosed.frontier_subset
theorem frontier_closure_subset : frontier (closure s) ⊆ frontier s :=
diff_subset_diff closure_closure.subset <| interior_mono subset_closure
#align frontier_closure_subset frontier_closure_subset
theorem frontier_interior_subset : frontier (interior s) ⊆ frontier s :=
diff_subset_diff (closure_mono interior_subset) interior_interior.symm.subset
#align frontier_interior_subset frontier_interior_subset
@[simp]
theorem frontier_compl (s : Set X) : frontier sᶜ = frontier s := by
simp only [frontier_eq_closure_inter_closure, compl_compl, inter_comm]
#align frontier_compl frontier_compl
@[simp]
theorem frontier_univ : frontier (univ : Set X) = ∅ := by simp [frontier]
#align frontier_univ frontier_univ
@[simp]
theorem frontier_empty : frontier (∅ : Set X) = ∅ := by simp [frontier]
#align frontier_empty frontier_empty
theorem frontier_inter_subset (s t : Set X) :
frontier (s ∩ t) ⊆ frontier s ∩ closure t ∪ closure s ∩ frontier t := by
simp only [frontier_eq_closure_inter_closure, compl_inter, closure_union]
refine (inter_subset_inter_left _ (closure_inter_subset_inter_closure s t)).trans_eq ?_
simp only [inter_union_distrib_left, union_inter_distrib_right, inter_assoc,
inter_comm (closure t)]
#align frontier_inter_subset frontier_inter_subset
theorem frontier_union_subset (s t : Set X) :
frontier (s ∪ t) ⊆ frontier s ∩ closure tᶜ ∪ closure sᶜ ∩ frontier t := by
simpa only [frontier_compl, ← compl_union] using frontier_inter_subset sᶜ tᶜ
#align frontier_union_subset frontier_union_subset
theorem IsClosed.frontier_eq (hs : IsClosed s) : frontier s = s \ interior s := by
rw [frontier, hs.closure_eq]
#align is_closed.frontier_eq IsClosed.frontier_eq
theorem IsOpen.frontier_eq (hs : IsOpen s) : frontier s = closure s \ s := by
rw [frontier, hs.interior_eq]
#align is_open.frontier_eq IsOpen.frontier_eq
theorem IsOpen.inter_frontier_eq (hs : IsOpen s) : s ∩ frontier s = ∅ := by
rw [hs.frontier_eq, inter_diff_self]
#align is_open.inter_frontier_eq IsOpen.inter_frontier_eq
theorem isClosed_frontier : IsClosed (frontier s) := by
rw [frontier_eq_closure_inter_closure]; exact IsClosed.inter isClosed_closure isClosed_closure
#align is_closed_frontier isClosed_frontier
theorem interior_frontier (h : IsClosed s) : interior (frontier s) = ∅ := by
have A : frontier s = s \ interior s := h.frontier_eq
have B : interior (frontier s) ⊆ interior s := by rw [A]; exact interior_mono diff_subset
have C : interior (frontier s) ⊆ frontier s := interior_subset
have : interior (frontier s) ⊆ interior s ∩ (s \ interior s) :=
subset_inter B (by simpa [A] using C)
rwa [inter_diff_self, subset_empty_iff] at this
#align interior_frontier interior_frontier
theorem closure_eq_interior_union_frontier (s : Set X) : closure s = interior s ∪ frontier s :=
(union_diff_cancel interior_subset_closure).symm
#align closure_eq_interior_union_frontier closure_eq_interior_union_frontier
theorem closure_eq_self_union_frontier (s : Set X) : closure s = s ∪ frontier s :=
(union_diff_cancel' interior_subset subset_closure).symm
#align closure_eq_self_union_frontier closure_eq_self_union_frontier
theorem Disjoint.frontier_left (ht : IsOpen t) (hd : Disjoint s t) : Disjoint (frontier s) t :=
subset_compl_iff_disjoint_right.1 <|
frontier_subset_closure.trans <| closure_minimal (disjoint_left.1 hd) <| isClosed_compl_iff.2 ht
#align disjoint.frontier_left Disjoint.frontier_left
theorem Disjoint.frontier_right (hs : IsOpen s) (hd : Disjoint s t) : Disjoint s (frontier t) :=
(hd.symm.frontier_left hs).symm
#align disjoint.frontier_right Disjoint.frontier_right
theorem frontier_eq_inter_compl_interior :
frontier s = (interior s)ᶜ ∩ (interior sᶜ)ᶜ := by
rw [← frontier_compl, ← closure_compl, ← diff_eq, closure_diff_interior]
#align frontier_eq_inter_compl_interior frontier_eq_inter_compl_interior
| Mathlib/Topology/Basic.lean | 773 | 776 | theorem compl_frontier_eq_union_interior :
(frontier s)ᶜ = interior s ∪ interior sᶜ := by |
rw [frontier_eq_inter_compl_interior]
simp only [compl_inter, compl_compl]
|
import Mathlib.Geometry.Euclidean.Angle.Oriented.Affine
import Mathlib.Geometry.Euclidean.Angle.Unoriented.RightAngle
#align_import geometry.euclidean.angle.oriented.right_angle from "leanprover-community/mathlib"@"46b633fd842bef9469441c0209906f6dddd2b4f5"
noncomputable section
open scoped EuclideanGeometry
open scoped Real
open scoped RealInnerProductSpace
namespace Orientation
open FiniteDimensional
variable {V : Type*} [NormedAddCommGroup V] [InnerProductSpace ℝ V]
variable [hd2 : Fact (finrank ℝ V = 2)] (o : Orientation ℝ V (Fin 2))
theorem oangle_add_right_eq_arccos_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
o.oangle x (x + y) = Real.arccos (‖x‖ / ‖x + y‖) := by
have hs : (o.oangle x (x + y)).sign = 1 := by
rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs,
InnerProductGeometry.angle_add_eq_arccos_of_inner_eq_zero
(o.inner_eq_zero_of_oangle_eq_pi_div_two h)]
#align orientation.oangle_add_right_eq_arccos_of_oangle_eq_pi_div_two Orientation.oangle_add_right_eq_arccos_of_oangle_eq_pi_div_two
theorem oangle_add_left_eq_arccos_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
o.oangle (x + y) y = Real.arccos (‖y‖ / ‖x + y‖) := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
rw [add_comm]
exact (-o).oangle_add_right_eq_arccos_of_oangle_eq_pi_div_two h
#align orientation.oangle_add_left_eq_arccos_of_oangle_eq_pi_div_two Orientation.oangle_add_left_eq_arccos_of_oangle_eq_pi_div_two
theorem oangle_add_right_eq_arcsin_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
o.oangle x (x + y) = Real.arcsin (‖y‖ / ‖x + y‖) := by
have hs : (o.oangle x (x + y)).sign = 1 := by
rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs,
InnerProductGeometry.angle_add_eq_arcsin_of_inner_eq_zero
(o.inner_eq_zero_of_oangle_eq_pi_div_two h)
(Or.inl (o.left_ne_zero_of_oangle_eq_pi_div_two h))]
#align orientation.oangle_add_right_eq_arcsin_of_oangle_eq_pi_div_two Orientation.oangle_add_right_eq_arcsin_of_oangle_eq_pi_div_two
theorem oangle_add_left_eq_arcsin_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
o.oangle (x + y) y = Real.arcsin (‖x‖ / ‖x + y‖) := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
rw [add_comm]
exact (-o).oangle_add_right_eq_arcsin_of_oangle_eq_pi_div_two h
#align orientation.oangle_add_left_eq_arcsin_of_oangle_eq_pi_div_two Orientation.oangle_add_left_eq_arcsin_of_oangle_eq_pi_div_two
theorem oangle_add_right_eq_arctan_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
o.oangle x (x + y) = Real.arctan (‖y‖ / ‖x‖) := by
have hs : (o.oangle x (x + y)).sign = 1 := by
rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs,
InnerProductGeometry.angle_add_eq_arctan_of_inner_eq_zero
(o.inner_eq_zero_of_oangle_eq_pi_div_two h) (o.left_ne_zero_of_oangle_eq_pi_div_two h)]
#align orientation.oangle_add_right_eq_arctan_of_oangle_eq_pi_div_two Orientation.oangle_add_right_eq_arctan_of_oangle_eq_pi_div_two
theorem oangle_add_left_eq_arctan_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
o.oangle (x + y) y = Real.arctan (‖x‖ / ‖y‖) := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
rw [add_comm]
exact (-o).oangle_add_right_eq_arctan_of_oangle_eq_pi_div_two h
#align orientation.oangle_add_left_eq_arctan_of_oangle_eq_pi_div_two Orientation.oangle_add_left_eq_arctan_of_oangle_eq_pi_div_two
theorem cos_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
Real.Angle.cos (o.oangle x (x + y)) = ‖x‖ / ‖x + y‖ := by
have hs : (o.oangle x (x + y)).sign = 1 := by
rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.cos_coe,
InnerProductGeometry.cos_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h)]
#align orientation.cos_oangle_add_right_of_oangle_eq_pi_div_two Orientation.cos_oangle_add_right_of_oangle_eq_pi_div_two
theorem cos_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
Real.Angle.cos (o.oangle (x + y) y) = ‖y‖ / ‖x + y‖ := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
rw [add_comm]
exact (-o).cos_oangle_add_right_of_oangle_eq_pi_div_two h
#align orientation.cos_oangle_add_left_of_oangle_eq_pi_div_two Orientation.cos_oangle_add_left_of_oangle_eq_pi_div_two
theorem sin_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
Real.Angle.sin (o.oangle x (x + y)) = ‖y‖ / ‖x + y‖ := by
have hs : (o.oangle x (x + y)).sign = 1 := by
rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.sin_coe,
InnerProductGeometry.sin_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h)
(Or.inl (o.left_ne_zero_of_oangle_eq_pi_div_two h))]
#align orientation.sin_oangle_add_right_of_oangle_eq_pi_div_two Orientation.sin_oangle_add_right_of_oangle_eq_pi_div_two
theorem sin_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
Real.Angle.sin (o.oangle (x + y) y) = ‖x‖ / ‖x + y‖ := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
rw [add_comm]
exact (-o).sin_oangle_add_right_of_oangle_eq_pi_div_two h
#align orientation.sin_oangle_add_left_of_oangle_eq_pi_div_two Orientation.sin_oangle_add_left_of_oangle_eq_pi_div_two
theorem tan_oangle_add_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
Real.Angle.tan (o.oangle x (x + y)) = ‖y‖ / ‖x‖ := by
have hs : (o.oangle x (x + y)).sign = 1 := by
rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.tan_coe,
InnerProductGeometry.tan_angle_add_of_inner_eq_zero (o.inner_eq_zero_of_oangle_eq_pi_div_two h)]
#align orientation.tan_oangle_add_right_of_oangle_eq_pi_div_two Orientation.tan_oangle_add_right_of_oangle_eq_pi_div_two
theorem tan_oangle_add_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
Real.Angle.tan (o.oangle (x + y) y) = ‖x‖ / ‖y‖ := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
rw [add_comm]
exact (-o).tan_oangle_add_right_of_oangle_eq_pi_div_two h
#align orientation.tan_oangle_add_left_of_oangle_eq_pi_div_two Orientation.tan_oangle_add_left_of_oangle_eq_pi_div_two
theorem cos_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : Real.Angle.cos (o.oangle x (x + y)) * ‖x + y‖ = ‖x‖ := by
have hs : (o.oangle x (x + y)).sign = 1 := by
rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.cos_coe,
InnerProductGeometry.cos_angle_add_mul_norm_of_inner_eq_zero
(o.inner_eq_zero_of_oangle_eq_pi_div_two h)]
#align orientation.cos_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two Orientation.cos_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two
theorem cos_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : Real.Angle.cos (o.oangle (x + y) y) * ‖x + y‖ = ‖y‖ := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
rw [add_comm]
exact (-o).cos_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two h
#align orientation.cos_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two Orientation.cos_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two
theorem sin_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : Real.Angle.sin (o.oangle x (x + y)) * ‖x + y‖ = ‖y‖ := by
have hs : (o.oangle x (x + y)).sign = 1 := by
rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.sin_coe,
InnerProductGeometry.sin_angle_add_mul_norm_of_inner_eq_zero
(o.inner_eq_zero_of_oangle_eq_pi_div_two h)]
#align orientation.sin_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two Orientation.sin_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two
theorem sin_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : Real.Angle.sin (o.oangle (x + y) y) * ‖x + y‖ = ‖x‖ := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
rw [add_comm]
exact (-o).sin_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two h
#align orientation.sin_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two Orientation.sin_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two
theorem tan_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : Real.Angle.tan (o.oangle x (x + y)) * ‖x‖ = ‖y‖ := by
have hs : (o.oangle x (x + y)).sign = 1 := by
rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.tan_coe,
InnerProductGeometry.tan_angle_add_mul_norm_of_inner_eq_zero
(o.inner_eq_zero_of_oangle_eq_pi_div_two h)
(Or.inl (o.left_ne_zero_of_oangle_eq_pi_div_two h))]
#align orientation.tan_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two Orientation.tan_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two
theorem tan_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : Real.Angle.tan (o.oangle (x + y) y) * ‖y‖ = ‖x‖ := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
rw [add_comm]
exact (-o).tan_oangle_add_right_mul_norm_of_oangle_eq_pi_div_two h
#align orientation.tan_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two Orientation.tan_oangle_add_left_mul_norm_of_oangle_eq_pi_div_two
theorem norm_div_cos_oangle_add_right_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : ‖x‖ / Real.Angle.cos (o.oangle x (x + y)) = ‖x + y‖ := by
have hs : (o.oangle x (x + y)).sign = 1 := by
rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.cos_coe,
InnerProductGeometry.norm_div_cos_angle_add_of_inner_eq_zero
(o.inner_eq_zero_of_oangle_eq_pi_div_two h)
(Or.inl (o.left_ne_zero_of_oangle_eq_pi_div_two h))]
#align orientation.norm_div_cos_oangle_add_right_of_oangle_eq_pi_div_two Orientation.norm_div_cos_oangle_add_right_of_oangle_eq_pi_div_two
theorem norm_div_cos_oangle_add_left_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : ‖y‖ / Real.Angle.cos (o.oangle (x + y) y) = ‖x + y‖ := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
rw [add_comm]
exact (-o).norm_div_cos_oangle_add_right_of_oangle_eq_pi_div_two h
#align orientation.norm_div_cos_oangle_add_left_of_oangle_eq_pi_div_two Orientation.norm_div_cos_oangle_add_left_of_oangle_eq_pi_div_two
theorem norm_div_sin_oangle_add_right_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : ‖y‖ / Real.Angle.sin (o.oangle x (x + y)) = ‖x + y‖ := by
have hs : (o.oangle x (x + y)).sign = 1 := by
rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.sin_coe,
InnerProductGeometry.norm_div_sin_angle_add_of_inner_eq_zero
(o.inner_eq_zero_of_oangle_eq_pi_div_two h)
(Or.inr (o.right_ne_zero_of_oangle_eq_pi_div_two h))]
#align orientation.norm_div_sin_oangle_add_right_of_oangle_eq_pi_div_two Orientation.norm_div_sin_oangle_add_right_of_oangle_eq_pi_div_two
theorem norm_div_sin_oangle_add_left_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : ‖x‖ / Real.Angle.sin (o.oangle (x + y) y) = ‖x + y‖ := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
rw [add_comm]
exact (-o).norm_div_sin_oangle_add_right_of_oangle_eq_pi_div_two h
#align orientation.norm_div_sin_oangle_add_left_of_oangle_eq_pi_div_two Orientation.norm_div_sin_oangle_add_left_of_oangle_eq_pi_div_two
theorem norm_div_tan_oangle_add_right_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : ‖y‖ / Real.Angle.tan (o.oangle x (x + y)) = ‖x‖ := by
have hs : (o.oangle x (x + y)).sign = 1 := by
rw [oangle_sign_add_right, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.tan_coe,
InnerProductGeometry.norm_div_tan_angle_add_of_inner_eq_zero
(o.inner_eq_zero_of_oangle_eq_pi_div_two h)
(Or.inr (o.right_ne_zero_of_oangle_eq_pi_div_two h))]
#align orientation.norm_div_tan_oangle_add_right_of_oangle_eq_pi_div_two Orientation.norm_div_tan_oangle_add_right_of_oangle_eq_pi_div_two
theorem norm_div_tan_oangle_add_left_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : ‖x‖ / Real.Angle.tan (o.oangle (x + y) y) = ‖y‖ := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
rw [add_comm]
exact (-o).norm_div_tan_oangle_add_right_of_oangle_eq_pi_div_two h
#align orientation.norm_div_tan_oangle_add_left_of_oangle_eq_pi_div_two Orientation.norm_div_tan_oangle_add_left_of_oangle_eq_pi_div_two
theorem oangle_sub_right_eq_arccos_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
o.oangle y (y - x) = Real.arccos (‖y‖ / ‖y - x‖) := by
have hs : (o.oangle y (y - x)).sign = 1 := by
rw [oangle_sign_sub_right_swap, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs,
InnerProductGeometry.angle_sub_eq_arccos_of_inner_eq_zero
(o.inner_rev_eq_zero_of_oangle_eq_pi_div_two h)]
#align orientation.oangle_sub_right_eq_arccos_of_oangle_eq_pi_div_two Orientation.oangle_sub_right_eq_arccos_of_oangle_eq_pi_div_two
theorem oangle_sub_left_eq_arccos_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
o.oangle (x - y) x = Real.arccos (‖x‖ / ‖x - y‖) := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
exact (-o).oangle_sub_right_eq_arccos_of_oangle_eq_pi_div_two h
#align orientation.oangle_sub_left_eq_arccos_of_oangle_eq_pi_div_two Orientation.oangle_sub_left_eq_arccos_of_oangle_eq_pi_div_two
theorem oangle_sub_right_eq_arcsin_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
o.oangle y (y - x) = Real.arcsin (‖x‖ / ‖y - x‖) := by
have hs : (o.oangle y (y - x)).sign = 1 := by
rw [oangle_sign_sub_right_swap, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs,
InnerProductGeometry.angle_sub_eq_arcsin_of_inner_eq_zero
(o.inner_rev_eq_zero_of_oangle_eq_pi_div_two h)
(Or.inl (o.right_ne_zero_of_oangle_eq_pi_div_two h))]
#align orientation.oangle_sub_right_eq_arcsin_of_oangle_eq_pi_div_two Orientation.oangle_sub_right_eq_arcsin_of_oangle_eq_pi_div_two
theorem oangle_sub_left_eq_arcsin_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
o.oangle (x - y) x = Real.arcsin (‖y‖ / ‖x - y‖) := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
exact (-o).oangle_sub_right_eq_arcsin_of_oangle_eq_pi_div_two h
#align orientation.oangle_sub_left_eq_arcsin_of_oangle_eq_pi_div_two Orientation.oangle_sub_left_eq_arcsin_of_oangle_eq_pi_div_two
theorem oangle_sub_right_eq_arctan_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
o.oangle y (y - x) = Real.arctan (‖x‖ / ‖y‖) := by
have hs : (o.oangle y (y - x)).sign = 1 := by
rw [oangle_sign_sub_right_swap, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs,
InnerProductGeometry.angle_sub_eq_arctan_of_inner_eq_zero
(o.inner_rev_eq_zero_of_oangle_eq_pi_div_two h) (o.right_ne_zero_of_oangle_eq_pi_div_two h)]
#align orientation.oangle_sub_right_eq_arctan_of_oangle_eq_pi_div_two Orientation.oangle_sub_right_eq_arctan_of_oangle_eq_pi_div_two
theorem oangle_sub_left_eq_arctan_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
o.oangle (x - y) x = Real.arctan (‖y‖ / ‖x‖) := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
exact (-o).oangle_sub_right_eq_arctan_of_oangle_eq_pi_div_two h
#align orientation.oangle_sub_left_eq_arctan_of_oangle_eq_pi_div_two Orientation.oangle_sub_left_eq_arctan_of_oangle_eq_pi_div_two
theorem cos_oangle_sub_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
Real.Angle.cos (o.oangle y (y - x)) = ‖y‖ / ‖y - x‖ := by
have hs : (o.oangle y (y - x)).sign = 1 := by
rw [oangle_sign_sub_right_swap, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.cos_coe,
InnerProductGeometry.cos_angle_sub_of_inner_eq_zero
(o.inner_rev_eq_zero_of_oangle_eq_pi_div_two h)]
#align orientation.cos_oangle_sub_right_of_oangle_eq_pi_div_two Orientation.cos_oangle_sub_right_of_oangle_eq_pi_div_two
theorem cos_oangle_sub_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
Real.Angle.cos (o.oangle (x - y) x) = ‖x‖ / ‖x - y‖ := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
exact (-o).cos_oangle_sub_right_of_oangle_eq_pi_div_two h
#align orientation.cos_oangle_sub_left_of_oangle_eq_pi_div_two Orientation.cos_oangle_sub_left_of_oangle_eq_pi_div_two
theorem sin_oangle_sub_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
Real.Angle.sin (o.oangle y (y - x)) = ‖x‖ / ‖y - x‖ := by
have hs : (o.oangle y (y - x)).sign = 1 := by
rw [oangle_sign_sub_right_swap, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.sin_coe,
InnerProductGeometry.sin_angle_sub_of_inner_eq_zero
(o.inner_rev_eq_zero_of_oangle_eq_pi_div_two h)
(Or.inl (o.right_ne_zero_of_oangle_eq_pi_div_two h))]
#align orientation.sin_oangle_sub_right_of_oangle_eq_pi_div_two Orientation.sin_oangle_sub_right_of_oangle_eq_pi_div_two
theorem sin_oangle_sub_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
Real.Angle.sin (o.oangle (x - y) x) = ‖y‖ / ‖x - y‖ := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
exact (-o).sin_oangle_sub_right_of_oangle_eq_pi_div_two h
#align orientation.sin_oangle_sub_left_of_oangle_eq_pi_div_two Orientation.sin_oangle_sub_left_of_oangle_eq_pi_div_two
theorem tan_oangle_sub_right_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
Real.Angle.tan (o.oangle y (y - x)) = ‖x‖ / ‖y‖ := by
have hs : (o.oangle y (y - x)).sign = 1 := by
rw [oangle_sign_sub_right_swap, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.tan_coe,
InnerProductGeometry.tan_angle_sub_of_inner_eq_zero
(o.inner_rev_eq_zero_of_oangle_eq_pi_div_two h)]
#align orientation.tan_oangle_sub_right_of_oangle_eq_pi_div_two Orientation.tan_oangle_sub_right_of_oangle_eq_pi_div_two
theorem tan_oangle_sub_left_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = ↑(π / 2)) :
Real.Angle.tan (o.oangle (x - y) x) = ‖y‖ / ‖x‖ := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
exact (-o).tan_oangle_sub_right_of_oangle_eq_pi_div_two h
#align orientation.tan_oangle_sub_left_of_oangle_eq_pi_div_two Orientation.tan_oangle_sub_left_of_oangle_eq_pi_div_two
theorem cos_oangle_sub_right_mul_norm_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : Real.Angle.cos (o.oangle y (y - x)) * ‖y - x‖ = ‖y‖ := by
have hs : (o.oangle y (y - x)).sign = 1 := by
rw [oangle_sign_sub_right_swap, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.cos_coe,
InnerProductGeometry.cos_angle_sub_mul_norm_of_inner_eq_zero
(o.inner_rev_eq_zero_of_oangle_eq_pi_div_two h)]
#align orientation.cos_oangle_sub_right_mul_norm_of_oangle_eq_pi_div_two Orientation.cos_oangle_sub_right_mul_norm_of_oangle_eq_pi_div_two
theorem cos_oangle_sub_left_mul_norm_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : Real.Angle.cos (o.oangle (x - y) x) * ‖x - y‖ = ‖x‖ := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
exact (-o).cos_oangle_sub_right_mul_norm_of_oangle_eq_pi_div_two h
#align orientation.cos_oangle_sub_left_mul_norm_of_oangle_eq_pi_div_two Orientation.cos_oangle_sub_left_mul_norm_of_oangle_eq_pi_div_two
theorem sin_oangle_sub_right_mul_norm_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : Real.Angle.sin (o.oangle y (y - x)) * ‖y - x‖ = ‖x‖ := by
have hs : (o.oangle y (y - x)).sign = 1 := by
rw [oangle_sign_sub_right_swap, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.sin_coe,
InnerProductGeometry.sin_angle_sub_mul_norm_of_inner_eq_zero
(o.inner_rev_eq_zero_of_oangle_eq_pi_div_two h)]
#align orientation.sin_oangle_sub_right_mul_norm_of_oangle_eq_pi_div_two Orientation.sin_oangle_sub_right_mul_norm_of_oangle_eq_pi_div_two
theorem sin_oangle_sub_left_mul_norm_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : Real.Angle.sin (o.oangle (x - y) x) * ‖x - y‖ = ‖y‖ := by
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
exact (-o).sin_oangle_sub_right_mul_norm_of_oangle_eq_pi_div_two h
#align orientation.sin_oangle_sub_left_mul_norm_of_oangle_eq_pi_div_two Orientation.sin_oangle_sub_left_mul_norm_of_oangle_eq_pi_div_two
theorem tan_oangle_sub_right_mul_norm_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : Real.Angle.tan (o.oangle y (y - x)) * ‖y‖ = ‖x‖ := by
have hs : (o.oangle y (y - x)).sign = 1 := by
rw [oangle_sign_sub_right_swap, h, Real.Angle.sign_coe_pi_div_two]
rw [o.oangle_eq_angle_of_sign_eq_one hs, Real.Angle.tan_coe,
InnerProductGeometry.tan_angle_sub_mul_norm_of_inner_eq_zero
(o.inner_rev_eq_zero_of_oangle_eq_pi_div_two h)
(Or.inl (o.right_ne_zero_of_oangle_eq_pi_div_two h))]
#align orientation.tan_oangle_sub_right_mul_norm_of_oangle_eq_pi_div_two Orientation.tan_oangle_sub_right_mul_norm_of_oangle_eq_pi_div_two
| Mathlib/Geometry/Euclidean/Angle/Oriented/RightAngle.lean | 428 | 431 | theorem tan_oangle_sub_left_mul_norm_of_oangle_eq_pi_div_two {x y : V}
(h : o.oangle x y = ↑(π / 2)) : Real.Angle.tan (o.oangle (x - y) x) * ‖x‖ = ‖y‖ := by |
rw [← neg_inj, oangle_rev, ← oangle_neg_orientation_eq_neg, neg_inj] at h ⊢
exact (-o).tan_oangle_sub_right_mul_norm_of_oangle_eq_pi_div_two h
|
import Mathlib.Data.Real.Sqrt
import Mathlib.Analysis.NormedSpace.Star.Basic
import Mathlib.Analysis.NormedSpace.ContinuousLinearMap
import Mathlib.Analysis.NormedSpace.Basic
#align_import data.is_R_or_C.basic from "leanprover-community/mathlib"@"baa88307f3e699fa7054ef04ec79fa4f056169cb"
section
local notation "𝓚" => algebraMap ℝ _
open ComplexConjugate
class RCLike (K : semiOutParam Type*) extends DenselyNormedField K, StarRing K,
NormedAlgebra ℝ K, CompleteSpace K where
re : K →+ ℝ
im : K →+ ℝ
I : K
I_re_ax : re I = 0
I_mul_I_ax : I = 0 ∨ I * I = -1
re_add_im_ax : ∀ z : K, 𝓚 (re z) + 𝓚 (im z) * I = z
ofReal_re_ax : ∀ r : ℝ, re (𝓚 r) = r
ofReal_im_ax : ∀ r : ℝ, im (𝓚 r) = 0
mul_re_ax : ∀ z w : K, re (z * w) = re z * re w - im z * im w
mul_im_ax : ∀ z w : K, im (z * w) = re z * im w + im z * re w
conj_re_ax : ∀ z : K, re (conj z) = re z
conj_im_ax : ∀ z : K, im (conj z) = -im z
conj_I_ax : conj I = -I
norm_sq_eq_def_ax : ∀ z : K, ‖z‖ ^ 2 = re z * re z + im z * im z
mul_im_I_ax : ∀ z : K, im z * im I = im z
[toPartialOrder : PartialOrder K]
le_iff_re_im {z w : K} : z ≤ w ↔ re z ≤ re w ∧ im z = im w
-- note we cannot put this in the `extends` clause
[toDecidableEq : DecidableEq K]
#align is_R_or_C RCLike
scoped[ComplexOrder] attribute [instance 100] RCLike.toPartialOrder
attribute [instance 100] RCLike.toDecidableEq
end
variable {K E : Type*} [RCLike K]
namespace RCLike
open ComplexConjugate
@[coe] abbrev ofReal : ℝ → K := Algebra.cast
noncomputable instance (priority := 900) algebraMapCoe : CoeTC ℝ K :=
⟨ofReal⟩
#align is_R_or_C.algebra_map_coe RCLike.algebraMapCoe
theorem ofReal_alg (x : ℝ) : (x : K) = x • (1 : K) :=
Algebra.algebraMap_eq_smul_one x
#align is_R_or_C.of_real_alg RCLike.ofReal_alg
theorem real_smul_eq_coe_mul (r : ℝ) (z : K) : r • z = (r : K) * z :=
Algebra.smul_def r z
#align is_R_or_C.real_smul_eq_coe_mul RCLike.real_smul_eq_coe_mul
theorem real_smul_eq_coe_smul [AddCommGroup E] [Module K E] [Module ℝ E] [IsScalarTower ℝ K E]
(r : ℝ) (x : E) : r • x = (r : K) • x := by rw [RCLike.ofReal_alg, smul_one_smul]
#align is_R_or_C.real_smul_eq_coe_smul RCLike.real_smul_eq_coe_smul
theorem algebraMap_eq_ofReal : ⇑(algebraMap ℝ K) = ofReal :=
rfl
#align is_R_or_C.algebra_map_eq_of_real RCLike.algebraMap_eq_ofReal
@[simp, rclike_simps]
theorem re_add_im (z : K) : (re z : K) + im z * I = z :=
RCLike.re_add_im_ax z
#align is_R_or_C.re_add_im RCLike.re_add_im
@[simp, norm_cast, rclike_simps]
theorem ofReal_re : ∀ r : ℝ, re (r : K) = r :=
RCLike.ofReal_re_ax
#align is_R_or_C.of_real_re RCLike.ofReal_re
@[simp, norm_cast, rclike_simps]
theorem ofReal_im : ∀ r : ℝ, im (r : K) = 0 :=
RCLike.ofReal_im_ax
#align is_R_or_C.of_real_im RCLike.ofReal_im
@[simp, rclike_simps]
theorem mul_re : ∀ z w : K, re (z * w) = re z * re w - im z * im w :=
RCLike.mul_re_ax
#align is_R_or_C.mul_re RCLike.mul_re
@[simp, rclike_simps]
theorem mul_im : ∀ z w : K, im (z * w) = re z * im w + im z * re w :=
RCLike.mul_im_ax
#align is_R_or_C.mul_im RCLike.mul_im
theorem ext_iff {z w : K} : z = w ↔ re z = re w ∧ im z = im w :=
⟨fun h => h ▸ ⟨rfl, rfl⟩, fun ⟨h₁, h₂⟩ => re_add_im z ▸ re_add_im w ▸ h₁ ▸ h₂ ▸ rfl⟩
#align is_R_or_C.ext_iff RCLike.ext_iff
theorem ext {z w : K} (hre : re z = re w) (him : im z = im w) : z = w :=
ext_iff.2 ⟨hre, him⟩
#align is_R_or_C.ext RCLike.ext
@[norm_cast]
theorem ofReal_zero : ((0 : ℝ) : K) = 0 :=
algebraMap.coe_zero
#align is_R_or_C.of_real_zero RCLike.ofReal_zero
@[rclike_simps]
theorem zero_re' : re (0 : K) = (0 : ℝ) :=
map_zero re
#align is_R_or_C.zero_re' RCLike.zero_re'
@[norm_cast]
theorem ofReal_one : ((1 : ℝ) : K) = 1 :=
map_one (algebraMap ℝ K)
#align is_R_or_C.of_real_one RCLike.ofReal_one
@[simp, rclike_simps]
theorem one_re : re (1 : K) = 1 := by rw [← ofReal_one, ofReal_re]
#align is_R_or_C.one_re RCLike.one_re
@[simp, rclike_simps]
theorem one_im : im (1 : K) = 0 := by rw [← ofReal_one, ofReal_im]
#align is_R_or_C.one_im RCLike.one_im
theorem ofReal_injective : Function.Injective ((↑) : ℝ → K) :=
(algebraMap ℝ K).injective
#align is_R_or_C.of_real_injective RCLike.ofReal_injective
@[norm_cast]
theorem ofReal_inj {z w : ℝ} : (z : K) = (w : K) ↔ z = w :=
algebraMap.coe_inj
#align is_R_or_C.of_real_inj RCLike.ofReal_inj
-- replaced by `RCLike.ofNat_re`
#noalign is_R_or_C.bit0_re
#noalign is_R_or_C.bit1_re
-- replaced by `RCLike.ofNat_im`
#noalign is_R_or_C.bit0_im
#noalign is_R_or_C.bit1_im
theorem ofReal_eq_zero {x : ℝ} : (x : K) = 0 ↔ x = 0 :=
algebraMap.lift_map_eq_zero_iff x
#align is_R_or_C.of_real_eq_zero RCLike.ofReal_eq_zero
theorem ofReal_ne_zero {x : ℝ} : (x : K) ≠ 0 ↔ x ≠ 0 :=
ofReal_eq_zero.not
#align is_R_or_C.of_real_ne_zero RCLike.ofReal_ne_zero
@[simp, rclike_simps, norm_cast]
theorem ofReal_add (r s : ℝ) : ((r + s : ℝ) : K) = r + s :=
algebraMap.coe_add _ _
#align is_R_or_C.of_real_add RCLike.ofReal_add
-- replaced by `RCLike.ofReal_ofNat`
#noalign is_R_or_C.of_real_bit0
#noalign is_R_or_C.of_real_bit1
@[simp, norm_cast, rclike_simps]
theorem ofReal_neg (r : ℝ) : ((-r : ℝ) : K) = -r :=
algebraMap.coe_neg r
#align is_R_or_C.of_real_neg RCLike.ofReal_neg
@[simp, norm_cast, rclike_simps]
theorem ofReal_sub (r s : ℝ) : ((r - s : ℝ) : K) = r - s :=
map_sub (algebraMap ℝ K) r s
#align is_R_or_C.of_real_sub RCLike.ofReal_sub
@[simp, rclike_simps, norm_cast]
theorem ofReal_sum {α : Type*} (s : Finset α) (f : α → ℝ) :
((∑ i ∈ s, f i : ℝ) : K) = ∑ i ∈ s, (f i : K) :=
map_sum (algebraMap ℝ K) _ _
#align is_R_or_C.of_real_sum RCLike.ofReal_sum
@[simp, rclike_simps, norm_cast]
theorem ofReal_finsupp_sum {α M : Type*} [Zero M] (f : α →₀ M) (g : α → M → ℝ) :
((f.sum fun a b => g a b : ℝ) : K) = f.sum fun a b => (g a b : K) :=
map_finsupp_sum (algebraMap ℝ K) f g
#align is_R_or_C.of_real_finsupp_sum RCLike.ofReal_finsupp_sum
@[simp, norm_cast, rclike_simps]
theorem ofReal_mul (r s : ℝ) : ((r * s : ℝ) : K) = r * s :=
algebraMap.coe_mul _ _
#align is_R_or_C.of_real_mul RCLike.ofReal_mul
@[simp, norm_cast, rclike_simps]
theorem ofReal_pow (r : ℝ) (n : ℕ) : ((r ^ n : ℝ) : K) = (r : K) ^ n :=
map_pow (algebraMap ℝ K) r n
#align is_R_or_C.of_real_pow RCLike.ofReal_pow
@[simp, rclike_simps, norm_cast]
theorem ofReal_prod {α : Type*} (s : Finset α) (f : α → ℝ) :
((∏ i ∈ s, f i : ℝ) : K) = ∏ i ∈ s, (f i : K) :=
map_prod (algebraMap ℝ K) _ _
#align is_R_or_C.of_real_prod RCLike.ofReal_prod
@[simp, rclike_simps, norm_cast]
theorem ofReal_finsupp_prod {α M : Type*} [Zero M] (f : α →₀ M) (g : α → M → ℝ) :
((f.prod fun a b => g a b : ℝ) : K) = f.prod fun a b => (g a b : K) :=
map_finsupp_prod _ f g
#align is_R_or_C.of_real_finsupp_prod RCLike.ofReal_finsupp_prod
@[simp, norm_cast, rclike_simps]
theorem real_smul_ofReal (r x : ℝ) : r • (x : K) = (r : K) * (x : K) :=
real_smul_eq_coe_mul _ _
#align is_R_or_C.real_smul_of_real RCLike.real_smul_ofReal
@[rclike_simps]
theorem re_ofReal_mul (r : ℝ) (z : K) : re (↑r * z) = r * re z := by
simp only [mul_re, ofReal_im, zero_mul, ofReal_re, sub_zero]
#align is_R_or_C.of_real_mul_re RCLike.re_ofReal_mul
@[rclike_simps]
theorem im_ofReal_mul (r : ℝ) (z : K) : im (↑r * z) = r * im z := by
simp only [add_zero, ofReal_im, zero_mul, ofReal_re, mul_im]
#align is_R_or_C.of_real_mul_im RCLike.im_ofReal_mul
@[rclike_simps]
theorem smul_re (r : ℝ) (z : K) : re (r • z) = r * re z := by
rw [real_smul_eq_coe_mul, re_ofReal_mul]
#align is_R_or_C.smul_re RCLike.smul_re
@[rclike_simps]
theorem smul_im (r : ℝ) (z : K) : im (r • z) = r * im z := by
rw [real_smul_eq_coe_mul, im_ofReal_mul]
#align is_R_or_C.smul_im RCLike.smul_im
@[simp, norm_cast, rclike_simps]
theorem norm_ofReal (r : ℝ) : ‖(r : K)‖ = |r| :=
norm_algebraMap' K r
#align is_R_or_C.norm_of_real RCLike.norm_ofReal
-- see Note [lower instance priority]
instance (priority := 100) charZero_rclike : CharZero K :=
(RingHom.charZero_iff (algebraMap ℝ K).injective).1 inferInstance
set_option linter.uppercaseLean3 false in
#align is_R_or_C.char_zero_R_or_C RCLike.charZero_rclike
@[simp, rclike_simps]
theorem I_re : re (I : K) = 0 :=
I_re_ax
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_re RCLike.I_re
@[simp, rclike_simps]
theorem I_im (z : K) : im z * im (I : K) = im z :=
mul_im_I_ax z
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_im RCLike.I_im
@[simp, rclike_simps]
theorem I_im' (z : K) : im (I : K) * im z = im z := by rw [mul_comm, I_im]
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_im' RCLike.I_im'
@[rclike_simps] -- porting note (#10618): was `simp`
theorem I_mul_re (z : K) : re (I * z) = -im z := by
simp only [I_re, zero_sub, I_im', zero_mul, mul_re]
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_mul_re RCLike.I_mul_re
theorem I_mul_I : (I : K) = 0 ∨ (I : K) * I = -1 :=
I_mul_I_ax
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_mul_I RCLike.I_mul_I
variable (𝕜) in
lemma I_eq_zero_or_im_I_eq_one : (I : K) = 0 ∨ im (I : K) = 1 :=
I_mul_I (K := K) |>.imp_right fun h ↦ by simpa [h] using (I_mul_re (I : K)).symm
@[simp, rclike_simps]
theorem conj_re (z : K) : re (conj z) = re z :=
RCLike.conj_re_ax z
#align is_R_or_C.conj_re RCLike.conj_re
@[simp, rclike_simps]
theorem conj_im (z : K) : im (conj z) = -im z :=
RCLike.conj_im_ax z
#align is_R_or_C.conj_im RCLike.conj_im
@[simp, rclike_simps]
theorem conj_I : conj (I : K) = -I :=
RCLike.conj_I_ax
set_option linter.uppercaseLean3 false in
#align is_R_or_C.conj_I RCLike.conj_I
@[simp, rclike_simps]
theorem conj_ofReal (r : ℝ) : conj (r : K) = (r : K) := by
rw [ext_iff]
simp only [ofReal_im, conj_im, eq_self_iff_true, conj_re, and_self_iff, neg_zero]
#align is_R_or_C.conj_of_real RCLike.conj_ofReal
-- replaced by `RCLike.conj_ofNat`
#noalign is_R_or_C.conj_bit0
#noalign is_R_or_C.conj_bit1
theorem conj_nat_cast (n : ℕ) : conj (n : K) = n := map_natCast _ _
-- See note [no_index around OfNat.ofNat]
theorem conj_ofNat (n : ℕ) [n.AtLeastTwo] : conj (no_index (OfNat.ofNat n : K)) = OfNat.ofNat n :=
map_ofNat _ _
@[rclike_simps] -- Porting note (#10618): was a `simp` but `simp` can prove it
theorem conj_neg_I : conj (-I) = (I : K) := by rw [map_neg, conj_I, neg_neg]
set_option linter.uppercaseLean3 false in
#align is_R_or_C.conj_neg_I RCLike.conj_neg_I
theorem conj_eq_re_sub_im (z : K) : conj z = re z - im z * I :=
(congr_arg conj (re_add_im z).symm).trans <| by
rw [map_add, map_mul, conj_I, conj_ofReal, conj_ofReal, mul_neg, sub_eq_add_neg]
#align is_R_or_C.conj_eq_re_sub_im RCLike.conj_eq_re_sub_im
theorem sub_conj (z : K) : z - conj z = 2 * im z * I :=
calc
z - conj z = re z + im z * I - (re z - im z * I) := by rw [re_add_im, ← conj_eq_re_sub_im]
_ = 2 * im z * I := by rw [add_sub_sub_cancel, ← two_mul, mul_assoc]
#align is_R_or_C.sub_conj RCLike.sub_conj
@[rclike_simps]
theorem conj_smul (r : ℝ) (z : K) : conj (r • z) = r • conj z := by
rw [conj_eq_re_sub_im, conj_eq_re_sub_im, smul_re, smul_im, ofReal_mul, ofReal_mul,
real_smul_eq_coe_mul r (_ - _), mul_sub, mul_assoc]
#align is_R_or_C.conj_smul RCLike.conj_smul
theorem add_conj (z : K) : z + conj z = 2 * re z :=
calc
z + conj z = re z + im z * I + (re z - im z * I) := by rw [re_add_im, conj_eq_re_sub_im]
_ = 2 * re z := by rw [add_add_sub_cancel, two_mul]
#align is_R_or_C.add_conj RCLike.add_conj
theorem re_eq_add_conj (z : K) : ↑(re z) = (z + conj z) / 2 := by
rw [add_conj, mul_div_cancel_left₀ (re z : K) two_ne_zero]
#align is_R_or_C.re_eq_add_conj RCLike.re_eq_add_conj
theorem im_eq_conj_sub (z : K) : ↑(im z) = I * (conj z - z) / 2 := by
rw [← neg_inj, ← ofReal_neg, ← I_mul_re, re_eq_add_conj, map_mul, conj_I, ← neg_div, ← mul_neg,
neg_sub, mul_sub, neg_mul, sub_eq_add_neg]
#align is_R_or_C.im_eq_conj_sub RCLike.im_eq_conj_sub
open List in
theorem is_real_TFAE (z : K) : TFAE [conj z = z, ∃ r : ℝ, (r : K) = z, ↑(re z) = z, im z = 0] := by
tfae_have 1 → 4
· intro h
rw [← @ofReal_inj K, im_eq_conj_sub, h, sub_self, mul_zero, zero_div,
ofReal_zero]
tfae_have 4 → 3
· intro h
conv_rhs => rw [← re_add_im z, h, ofReal_zero, zero_mul, add_zero]
tfae_have 3 → 2
· exact fun h => ⟨_, h⟩
tfae_have 2 → 1
· exact fun ⟨r, hr⟩ => hr ▸ conj_ofReal _
tfae_finish
#align is_R_or_C.is_real_tfae RCLike.is_real_TFAE
theorem conj_eq_iff_real {z : K} : conj z = z ↔ ∃ r : ℝ, z = (r : K) :=
((is_real_TFAE z).out 0 1).trans <| by simp only [eq_comm]
#align is_R_or_C.conj_eq_iff_real RCLike.conj_eq_iff_real
theorem conj_eq_iff_re {z : K} : conj z = z ↔ (re z : K) = z :=
(is_real_TFAE z).out 0 2
#align is_R_or_C.conj_eq_iff_re RCLike.conj_eq_iff_re
theorem conj_eq_iff_im {z : K} : conj z = z ↔ im z = 0 :=
(is_real_TFAE z).out 0 3
#align is_R_or_C.conj_eq_iff_im RCLike.conj_eq_iff_im
@[simp]
theorem star_def : (Star.star : K → K) = conj :=
rfl
#align is_R_or_C.star_def RCLike.star_def
variable (K)
abbrev conjToRingEquiv : K ≃+* Kᵐᵒᵖ :=
starRingEquiv
#align is_R_or_C.conj_to_ring_equiv RCLike.conjToRingEquiv
variable {K} {z : K}
def normSq : K →*₀ ℝ where
toFun z := re z * re z + im z * im z
map_zero' := by simp only [add_zero, mul_zero, map_zero]
map_one' := by simp only [one_im, add_zero, mul_one, one_re, mul_zero]
map_mul' z w := by
simp only [mul_im, mul_re]
ring
#align is_R_or_C.norm_sq RCLike.normSq
theorem normSq_apply (z : K) : normSq z = re z * re z + im z * im z :=
rfl
#align is_R_or_C.norm_sq_apply RCLike.normSq_apply
theorem norm_sq_eq_def {z : K} : ‖z‖ ^ 2 = re z * re z + im z * im z :=
norm_sq_eq_def_ax z
#align is_R_or_C.norm_sq_eq_def RCLike.norm_sq_eq_def
theorem normSq_eq_def' (z : K) : normSq z = ‖z‖ ^ 2 :=
norm_sq_eq_def.symm
#align is_R_or_C.norm_sq_eq_def' RCLike.normSq_eq_def'
@[rclike_simps]
theorem normSq_zero : normSq (0 : K) = 0 :=
normSq.map_zero
#align is_R_or_C.norm_sq_zero RCLike.normSq_zero
@[rclike_simps]
theorem normSq_one : normSq (1 : K) = 1 :=
normSq.map_one
#align is_R_or_C.norm_sq_one RCLike.normSq_one
theorem normSq_nonneg (z : K) : 0 ≤ normSq z :=
add_nonneg (mul_self_nonneg _) (mul_self_nonneg _)
#align is_R_or_C.norm_sq_nonneg RCLike.normSq_nonneg
@[rclike_simps] -- porting note (#10618): was `simp`
theorem normSq_eq_zero {z : K} : normSq z = 0 ↔ z = 0 :=
map_eq_zero _
#align is_R_or_C.norm_sq_eq_zero RCLike.normSq_eq_zero
@[simp, rclike_simps]
theorem normSq_pos {z : K} : 0 < normSq z ↔ z ≠ 0 := by
rw [lt_iff_le_and_ne, Ne, eq_comm]; simp [normSq_nonneg]
#align is_R_or_C.norm_sq_pos RCLike.normSq_pos
@[simp, rclike_simps]
theorem normSq_neg (z : K) : normSq (-z) = normSq z := by simp only [normSq_eq_def', norm_neg]
#align is_R_or_C.norm_sq_neg RCLike.normSq_neg
@[simp, rclike_simps]
theorem normSq_conj (z : K) : normSq (conj z) = normSq z := by
simp only [normSq_apply, neg_mul, mul_neg, neg_neg, rclike_simps]
#align is_R_or_C.norm_sq_conj RCLike.normSq_conj
@[rclike_simps] -- porting note (#10618): was `simp`
theorem normSq_mul (z w : K) : normSq (z * w) = normSq z * normSq w :=
map_mul _ z w
#align is_R_or_C.norm_sq_mul RCLike.normSq_mul
theorem normSq_add (z w : K) : normSq (z + w) = normSq z + normSq w + 2 * re (z * conj w) := by
simp only [normSq_apply, map_add, rclike_simps]
ring
#align is_R_or_C.norm_sq_add RCLike.normSq_add
theorem re_sq_le_normSq (z : K) : re z * re z ≤ normSq z :=
le_add_of_nonneg_right (mul_self_nonneg _)
#align is_R_or_C.re_sq_le_norm_sq RCLike.re_sq_le_normSq
theorem im_sq_le_normSq (z : K) : im z * im z ≤ normSq z :=
le_add_of_nonneg_left (mul_self_nonneg _)
#align is_R_or_C.im_sq_le_norm_sq RCLike.im_sq_le_normSq
theorem mul_conj (z : K) : z * conj z = ‖z‖ ^ 2 := by
apply ext <;> simp [← ofReal_pow, norm_sq_eq_def, mul_comm]
#align is_R_or_C.mul_conj RCLike.mul_conj
theorem conj_mul (z : K) : conj z * z = ‖z‖ ^ 2 := by rw [mul_comm, mul_conj]
#align is_R_or_C.conj_mul RCLike.conj_mul
lemma inv_eq_conj (hz : ‖z‖ = 1) : z⁻¹ = conj z :=
inv_eq_of_mul_eq_one_left $ by simp_rw [conj_mul, hz, algebraMap.coe_one, one_pow]
theorem normSq_sub (z w : K) : normSq (z - w) = normSq z + normSq w - 2 * re (z * conj w) := by
simp only [normSq_add, sub_eq_add_neg, map_neg, mul_neg, normSq_neg, map_neg]
#align is_R_or_C.norm_sq_sub RCLike.normSq_sub
theorem sqrt_normSq_eq_norm {z : K} : √(normSq z) = ‖z‖ := by
rw [normSq_eq_def', Real.sqrt_sq (norm_nonneg _)]
#align is_R_or_C.sqrt_norm_sq_eq_norm RCLike.sqrt_normSq_eq_norm
@[simp, norm_cast, rclike_simps]
theorem ofReal_inv (r : ℝ) : ((r⁻¹ : ℝ) : K) = (r : K)⁻¹ :=
map_inv₀ _ r
#align is_R_or_C.of_real_inv RCLike.ofReal_inv
theorem inv_def (z : K) : z⁻¹ = conj z * ((‖z‖ ^ 2)⁻¹ : ℝ) := by
rcases eq_or_ne z 0 with (rfl | h₀)
· simp
· apply inv_eq_of_mul_eq_one_right
rw [← mul_assoc, mul_conj, ofReal_inv, ofReal_pow, mul_inv_cancel]
simpa
#align is_R_or_C.inv_def RCLike.inv_def
@[simp, rclike_simps]
theorem inv_re (z : K) : re z⁻¹ = re z / normSq z := by
rw [inv_def, normSq_eq_def', mul_comm, re_ofReal_mul, conj_re, div_eq_inv_mul]
#align is_R_or_C.inv_re RCLike.inv_re
@[simp, rclike_simps]
theorem inv_im (z : K) : im z⁻¹ = -im z / normSq z := by
rw [inv_def, normSq_eq_def', mul_comm, im_ofReal_mul, conj_im, div_eq_inv_mul]
#align is_R_or_C.inv_im RCLike.inv_im
theorem div_re (z w : K) : re (z / w) = re z * re w / normSq w + im z * im w / normSq w := by
simp only [div_eq_mul_inv, mul_assoc, sub_eq_add_neg, neg_mul, mul_neg, neg_neg, map_neg,
rclike_simps]
#align is_R_or_C.div_re RCLike.div_re
theorem div_im (z w : K) : im (z / w) = im z * re w / normSq w - re z * im w / normSq w := by
simp only [div_eq_mul_inv, mul_assoc, sub_eq_add_neg, add_comm, neg_mul, mul_neg, map_neg,
rclike_simps]
#align is_R_or_C.div_im RCLike.div_im
@[rclike_simps] -- porting note (#10618): was `simp`
theorem conj_inv (x : K) : conj x⁻¹ = (conj x)⁻¹ :=
star_inv' _
#align is_R_or_C.conj_inv RCLike.conj_inv
lemma conj_div (x y : K) : conj (x / y) = conj x / conj y := map_div' conj conj_inv _ _
--TODO: Do we rather want the map as an explicit definition?
lemma exists_norm_eq_mul_self (x : K) : ∃ c, ‖c‖ = 1 ∧ ↑‖x‖ = c * x := by
obtain rfl | hx := eq_or_ne x 0
· exact ⟨1, by simp⟩
· exact ⟨‖x‖ / x, by simp [norm_ne_zero_iff.2, hx]⟩
lemma exists_norm_mul_eq_self (x : K) : ∃ c, ‖c‖ = 1 ∧ c * ‖x‖ = x := by
obtain rfl | hx := eq_or_ne x 0
· exact ⟨1, by simp⟩
· exact ⟨x / ‖x‖, by simp [norm_ne_zero_iff.2, hx]⟩
@[simp, norm_cast, rclike_simps]
theorem ofReal_div (r s : ℝ) : ((r / s : ℝ) : K) = r / s :=
map_div₀ (algebraMap ℝ K) r s
#align is_R_or_C.of_real_div RCLike.ofReal_div
| Mathlib/Analysis/RCLike/Basic.lean | 583 | 584 | theorem div_re_ofReal {z : K} {r : ℝ} : re (z / r) = re z / r := by |
rw [div_eq_inv_mul, div_eq_inv_mul, ← ofReal_inv, re_ofReal_mul]
|
import Mathlib.Algebra.Field.Subfield
import Mathlib.Algebra.GroupWithZero.Divisibility
import Mathlib.Topology.Algebra.GroupWithZero
import Mathlib.Topology.Algebra.Ring.Basic
import Mathlib.Topology.Order.LocalExtr
#align_import topology.algebra.field from "leanprover-community/mathlib"@"c10e724be91096453ee3db13862b9fb9a992fef2"
variable {K : Type*} [DivisionRing K] [TopologicalSpace K]
theorem Filter.tendsto_cocompact_mul_left₀ [ContinuousMul K] {a : K} (ha : a ≠ 0) :
Filter.Tendsto (fun x : K => a * x) (Filter.cocompact K) (Filter.cocompact K) :=
Filter.tendsto_cocompact_mul_left (inv_mul_cancel ha)
#align filter.tendsto_cocompact_mul_left₀ Filter.tendsto_cocompact_mul_left₀
theorem Filter.tendsto_cocompact_mul_right₀ [ContinuousMul K] {a : K} (ha : a ≠ 0) :
Filter.Tendsto (fun x : K => x * a) (Filter.cocompact K) (Filter.cocompact K) :=
Filter.tendsto_cocompact_mul_right (mul_inv_cancel ha)
#align filter.tendsto_cocompact_mul_right₀ Filter.tendsto_cocompact_mul_right₀
variable (K)
class TopologicalDivisionRing extends TopologicalRing K, HasContinuousInv₀ K : Prop
#align topological_division_ring TopologicalDivisionRing
section LocalExtr
variable {α β : Type*} [TopologicalSpace α] [LinearOrderedSemifield β] {a : α}
open Topology
| Mathlib/Topology/Algebra/Field.lean | 112 | 114 | theorem IsLocalMin.inv {f : α → β} {a : α} (h1 : IsLocalMin f a) (h2 : ∀ᶠ z in 𝓝 a, 0 < f z) :
IsLocalMax f⁻¹ a := by |
filter_upwards [h1, h2] with z h3 h4 using(inv_le_inv h4 h2.self_of_nhds).mpr h3
|
import Mathlib.MeasureTheory.Integral.Bochner
import Mathlib.MeasureTheory.Group.Measure
#align_import measure_theory.group.integration from "leanprover-community/mathlib"@"ec247d43814751ffceb33b758e8820df2372bf6f"
namespace MeasureTheory
open Measure TopologicalSpace
open scoped ENNReal
variable {𝕜 M α G E F : Type*} [MeasurableSpace G]
variable [NormedAddCommGroup E] [NormedSpace ℝ E] [CompleteSpace E] [NormedAddCommGroup F]
variable {μ : Measure G} {f : G → E} {g : G}
section SMul
variable [Group G] [MeasurableSpace α] [MulAction G α] [MeasurableSMul G α]
@[to_additive] -- Porting note: was `@[simp]`
| Mathlib/MeasureTheory/Group/Integral.lean | 165 | 168 | theorem integral_smul_eq_self {μ : Measure α} [SMulInvariantMeasure G α μ] (f : α → E) {g : G} :
(∫ x, f (g • x) ∂μ) = ∫ x, f x ∂μ := by |
have h : MeasurableEmbedding fun x : α => g • x := (MeasurableEquiv.smul g).measurableEmbedding
rw [← h.integral_map, map_smul]
|
import Mathlib.Algebra.BigOperators.Group.Finset
import Mathlib.Algebra.Group.Commute.Hom
import Mathlib.Data.Fintype.Card
#align_import data.finset.noncomm_prod from "leanprover-community/mathlib"@"509de852e1de55e1efa8eacfa11df0823f26f226"
variable {F ι α β γ : Type*} (f : α → β → β) (op : α → α → α)
namespace Multiset
def noncommFoldr (s : Multiset α)
(comm : { x | x ∈ s }.Pairwise fun x y => ∀ b, f x (f y b) = f y (f x b)) (b : β) : β :=
s.attach.foldr (f ∘ Subtype.val)
(fun ⟨_, hx⟩ ⟨_, hy⟩ =>
haveI : IsRefl α fun x y => ∀ b, f x (f y b) = f y (f x b) := ⟨fun _ _ => rfl⟩
comm.of_refl hx hy)
b
#align multiset.noncomm_foldr Multiset.noncommFoldr
@[simp]
theorem noncommFoldr_coe (l : List α) (comm) (b : β) :
noncommFoldr f (l : Multiset α) comm b = l.foldr f b := by
simp only [noncommFoldr, coe_foldr, coe_attach, List.attach, List.attachWith, Function.comp]
rw [← List.foldr_map]
simp [List.map_pmap]
#align multiset.noncomm_foldr_coe Multiset.noncommFoldr_coe
@[simp]
theorem noncommFoldr_empty (h) (b : β) : noncommFoldr f (0 : Multiset α) h b = b :=
rfl
#align multiset.noncomm_foldr_empty Multiset.noncommFoldr_empty
| Mathlib/Data/Finset/NoncommProd.lean | 64 | 67 | theorem noncommFoldr_cons (s : Multiset α) (a : α) (h h') (b : β) :
noncommFoldr f (a ::ₘ s) h b = f a (noncommFoldr f s h' b) := by |
induction s using Quotient.inductionOn
simp
|
import Mathlib.CategoryTheory.Balanced
import Mathlib.CategoryTheory.Limits.EssentiallySmall
import Mathlib.CategoryTheory.Limits.Opposites
import Mathlib.CategoryTheory.Limits.Shapes.ZeroMorphisms
import Mathlib.CategoryTheory.Subobject.Lattice
import Mathlib.CategoryTheory.Subobject.WellPowered
import Mathlib.Data.Set.Opposite
import Mathlib.Data.Set.Subsingleton
#align_import category_theory.generator from "leanprover-community/mathlib"@"f187f1074fa1857c94589cc653c786cadc4c35ff"
universe w v₁ v₂ u₁ u₂
open CategoryTheory.Limits Opposite
namespace CategoryTheory
variable {C : Type u₁} [Category.{v₁} C] {D : Type u₂} [Category.{v₂} D]
def IsSeparating (𝒢 : Set C) : Prop :=
∀ ⦃X Y : C⦄ (f g : X ⟶ Y), (∀ G ∈ 𝒢, ∀ (h : G ⟶ X), h ≫ f = h ≫ g) → f = g
#align category_theory.is_separating CategoryTheory.IsSeparating
def IsCoseparating (𝒢 : Set C) : Prop :=
∀ ⦃X Y : C⦄ (f g : X ⟶ Y), (∀ G ∈ 𝒢, ∀ (h : Y ⟶ G), f ≫ h = g ≫ h) → f = g
#align category_theory.is_coseparating CategoryTheory.IsCoseparating
def IsDetecting (𝒢 : Set C) : Prop :=
∀ ⦃X Y : C⦄ (f : X ⟶ Y), (∀ G ∈ 𝒢, ∀ (h : G ⟶ Y), ∃! h' : G ⟶ X, h' ≫ f = h) → IsIso f
#align category_theory.is_detecting CategoryTheory.IsDetecting
def IsCodetecting (𝒢 : Set C) : Prop :=
∀ ⦃X Y : C⦄ (f : X ⟶ Y), (∀ G ∈ 𝒢, ∀ (h : X ⟶ G), ∃! h' : Y ⟶ G, f ≫ h' = h) → IsIso f
#align category_theory.is_codetecting CategoryTheory.IsCodetecting
section Dual
| Mathlib/CategoryTheory/Generator.lean | 93 | 98 | theorem isSeparating_op_iff (𝒢 : Set C) : IsSeparating 𝒢.op ↔ IsCoseparating 𝒢 := by |
refine ⟨fun h𝒢 X Y f g hfg => ?_, fun h𝒢 X Y f g hfg => ?_⟩
· refine Quiver.Hom.op_inj (h𝒢 _ _ fun G hG h => Quiver.Hom.unop_inj ?_)
simpa only [unop_comp, Quiver.Hom.unop_op] using hfg _ (Set.mem_op.1 hG) _
· refine Quiver.Hom.unop_inj (h𝒢 _ _ fun G hG h => Quiver.Hom.op_inj ?_)
simpa only [op_comp, Quiver.Hom.op_unop] using hfg _ (Set.op_mem_op.2 hG) _
|
import Mathlib.Order.Interval.Set.Basic
import Mathlib.Order.Hom.Set
#align_import data.set.intervals.order_iso from "leanprover-community/mathlib"@"d012cd09a9b256d870751284dd6a29882b0be105"
open Set
namespace OrderIso
section Preorder
variable {α β : Type*} [Preorder α] [Preorder β]
@[simp]
theorem preimage_Iic (e : α ≃o β) (b : β) : e ⁻¹' Iic b = Iic (e.symm b) := by
ext x
simp [← e.le_iff_le]
#align order_iso.preimage_Iic OrderIso.preimage_Iic
@[simp]
theorem preimage_Ici (e : α ≃o β) (b : β) : e ⁻¹' Ici b = Ici (e.symm b) := by
ext x
simp [← e.le_iff_le]
#align order_iso.preimage_Ici OrderIso.preimage_Ici
@[simp]
theorem preimage_Iio (e : α ≃o β) (b : β) : e ⁻¹' Iio b = Iio (e.symm b) := by
ext x
simp [← e.lt_iff_lt]
#align order_iso.preimage_Iio OrderIso.preimage_Iio
@[simp]
theorem preimage_Ioi (e : α ≃o β) (b : β) : e ⁻¹' Ioi b = Ioi (e.symm b) := by
ext x
simp [← e.lt_iff_lt]
#align order_iso.preimage_Ioi OrderIso.preimage_Ioi
@[simp]
theorem preimage_Icc (e : α ≃o β) (a b : β) : e ⁻¹' Icc a b = Icc (e.symm a) (e.symm b) := by
simp [← Ici_inter_Iic]
#align order_iso.preimage_Icc OrderIso.preimage_Icc
@[simp]
theorem preimage_Ico (e : α ≃o β) (a b : β) : e ⁻¹' Ico a b = Ico (e.symm a) (e.symm b) := by
simp [← Ici_inter_Iio]
#align order_iso.preimage_Ico OrderIso.preimage_Ico
@[simp]
theorem preimage_Ioc (e : α ≃o β) (a b : β) : e ⁻¹' Ioc a b = Ioc (e.symm a) (e.symm b) := by
simp [← Ioi_inter_Iic]
#align order_iso.preimage_Ioc OrderIso.preimage_Ioc
@[simp]
theorem preimage_Ioo (e : α ≃o β) (a b : β) : e ⁻¹' Ioo a b = Ioo (e.symm a) (e.symm b) := by
simp [← Ioi_inter_Iio]
#align order_iso.preimage_Ioo OrderIso.preimage_Ioo
@[simp]
theorem image_Iic (e : α ≃o β) (a : α) : e '' Iic a = Iic (e a) := by
rw [e.image_eq_preimage, e.symm.preimage_Iic, e.symm_symm]
#align order_iso.image_Iic OrderIso.image_Iic
@[simp]
theorem image_Ici (e : α ≃o β) (a : α) : e '' Ici a = Ici (e a) :=
e.dual.image_Iic a
#align order_iso.image_Ici OrderIso.image_Ici
@[simp]
theorem image_Iio (e : α ≃o β) (a : α) : e '' Iio a = Iio (e a) := by
rw [e.image_eq_preimage, e.symm.preimage_Iio, e.symm_symm]
#align order_iso.image_Iio OrderIso.image_Iio
@[simp]
theorem image_Ioi (e : α ≃o β) (a : α) : e '' Ioi a = Ioi (e a) :=
e.dual.image_Iio a
#align order_iso.image_Ioi OrderIso.image_Ioi
@[simp]
theorem image_Ioo (e : α ≃o β) (a b : α) : e '' Ioo a b = Ioo (e a) (e b) := by
rw [e.image_eq_preimage, e.symm.preimage_Ioo, e.symm_symm]
#align order_iso.image_Ioo OrderIso.image_Ioo
@[simp]
theorem image_Ioc (e : α ≃o β) (a b : α) : e '' Ioc a b = Ioc (e a) (e b) := by
rw [e.image_eq_preimage, e.symm.preimage_Ioc, e.symm_symm]
#align order_iso.image_Ioc OrderIso.image_Ioc
@[simp]
| Mathlib/Order/Interval/Set/OrderIso.lean | 98 | 99 | theorem image_Ico (e : α ≃o β) (a b : α) : e '' Ico a b = Ico (e a) (e b) := by |
rw [e.image_eq_preimage, e.symm.preimage_Ico, e.symm_symm]
|
import Mathlib.Order.Interval.Set.Disjoint
import Mathlib.MeasureTheory.Integral.SetIntegral
import Mathlib.MeasureTheory.Measure.Lebesgue.Basic
#align_import measure_theory.integral.interval_integral from "leanprover-community/mathlib"@"fd5edc43dc4f10b85abfe544b88f82cf13c5f844"
noncomputable section
open scoped Classical
open MeasureTheory Set Filter Function
open scoped Classical Topology Filter ENNReal Interval NNReal
variable {ι 𝕜 E F A : Type*} [NormedAddCommGroup E]
def IntervalIntegrable (f : ℝ → E) (μ : Measure ℝ) (a b : ℝ) : Prop :=
IntegrableOn f (Ioc a b) μ ∧ IntegrableOn f (Ioc b a) μ
#align interval_integrable IntervalIntegrable
section
variable {f : ℝ → E} {a b : ℝ} {μ : Measure ℝ}
theorem intervalIntegrable_iff : IntervalIntegrable f μ a b ↔ IntegrableOn f (Ι a b) μ := by
rw [uIoc_eq_union, integrableOn_union, IntervalIntegrable]
#align interval_integrable_iff intervalIntegrable_iff
theorem IntervalIntegrable.def' (h : IntervalIntegrable f μ a b) : IntegrableOn f (Ι a b) μ :=
intervalIntegrable_iff.mp h
#align interval_integrable.def IntervalIntegrable.def'
theorem intervalIntegrable_iff_integrableOn_Ioc_of_le (hab : a ≤ b) :
IntervalIntegrable f μ a b ↔ IntegrableOn f (Ioc a b) μ := by
rw [intervalIntegrable_iff, uIoc_of_le hab]
#align interval_integrable_iff_integrable_Ioc_of_le intervalIntegrable_iff_integrableOn_Ioc_of_le
theorem intervalIntegrable_iff' [NoAtoms μ] :
IntervalIntegrable f μ a b ↔ IntegrableOn f (uIcc a b) μ := by
rw [intervalIntegrable_iff, ← Icc_min_max, uIoc, integrableOn_Icc_iff_integrableOn_Ioc]
#align interval_integrable_iff' intervalIntegrable_iff'
theorem intervalIntegrable_iff_integrableOn_Icc_of_le {f : ℝ → E} {a b : ℝ} (hab : a ≤ b)
{μ : Measure ℝ} [NoAtoms μ] : IntervalIntegrable f μ a b ↔ IntegrableOn f (Icc a b) μ := by
rw [intervalIntegrable_iff_integrableOn_Ioc_of_le hab, integrableOn_Icc_iff_integrableOn_Ioc]
#align interval_integrable_iff_integrable_Icc_of_le intervalIntegrable_iff_integrableOn_Icc_of_le
theorem intervalIntegrable_iff_integrableOn_Ico_of_le [NoAtoms μ] (hab : a ≤ b) :
IntervalIntegrable f μ a b ↔ IntegrableOn f (Ico a b) μ := by
rw [intervalIntegrable_iff_integrableOn_Icc_of_le hab, integrableOn_Icc_iff_integrableOn_Ico]
theorem intervalIntegrable_iff_integrableOn_Ioo_of_le [NoAtoms μ] (hab : a ≤ b) :
IntervalIntegrable f μ a b ↔ IntegrableOn f (Ioo a b) μ := by
rw [intervalIntegrable_iff_integrableOn_Icc_of_le hab, integrableOn_Icc_iff_integrableOn_Ioo]
theorem MeasureTheory.Integrable.intervalIntegrable (hf : Integrable f μ) :
IntervalIntegrable f μ a b :=
⟨hf.integrableOn, hf.integrableOn⟩
#align measure_theory.integrable.interval_integrable MeasureTheory.Integrable.intervalIntegrable
theorem MeasureTheory.IntegrableOn.intervalIntegrable (hf : IntegrableOn f [[a, b]] μ) :
IntervalIntegrable f μ a b :=
⟨MeasureTheory.IntegrableOn.mono_set hf (Ioc_subset_Icc_self.trans Icc_subset_uIcc),
MeasureTheory.IntegrableOn.mono_set hf (Ioc_subset_Icc_self.trans Icc_subset_uIcc')⟩
#align measure_theory.integrable_on.interval_integrable MeasureTheory.IntegrableOn.intervalIntegrable
theorem intervalIntegrable_const_iff {c : E} :
IntervalIntegrable (fun _ => c) μ a b ↔ c = 0 ∨ μ (Ι a b) < ∞ := by
simp only [intervalIntegrable_iff, integrableOn_const]
#align interval_integrable_const_iff intervalIntegrable_const_iff
@[simp]
theorem intervalIntegrable_const [IsLocallyFiniteMeasure μ] {c : E} :
IntervalIntegrable (fun _ => c) μ a b :=
intervalIntegrable_const_iff.2 <| Or.inr measure_Ioc_lt_top
#align interval_integrable_const intervalIntegrable_const
end
namespace IntervalIntegrable
section
variable {f : ℝ → E} {a b c d : ℝ} {μ ν : Measure ℝ}
@[symm]
nonrec theorem symm (h : IntervalIntegrable f μ a b) : IntervalIntegrable f μ b a :=
h.symm
#align interval_integrable.symm IntervalIntegrable.symm
@[refl, simp] -- Porting note: added `simp`
theorem refl : IntervalIntegrable f μ a a := by constructor <;> simp
#align interval_integrable.refl IntervalIntegrable.refl
@[trans]
theorem trans {a b c : ℝ} (hab : IntervalIntegrable f μ a b) (hbc : IntervalIntegrable f μ b c) :
IntervalIntegrable f μ a c :=
⟨(hab.1.union hbc.1).mono_set Ioc_subset_Ioc_union_Ioc,
(hbc.2.union hab.2).mono_set Ioc_subset_Ioc_union_Ioc⟩
#align interval_integrable.trans IntervalIntegrable.trans
theorem trans_iterate_Ico {a : ℕ → ℝ} {m n : ℕ} (hmn : m ≤ n)
(hint : ∀ k ∈ Ico m n, IntervalIntegrable f μ (a k) (a <| k + 1)) :
IntervalIntegrable f μ (a m) (a n) := by
revert hint
refine Nat.le_induction ?_ ?_ n hmn
· simp
· intro p hp IH h
exact (IH fun k hk => h k (Ico_subset_Ico_right p.le_succ hk)).trans (h p (by simp [hp]))
#align interval_integrable.trans_iterate_Ico IntervalIntegrable.trans_iterate_Ico
theorem trans_iterate {a : ℕ → ℝ} {n : ℕ}
(hint : ∀ k < n, IntervalIntegrable f μ (a k) (a <| k + 1)) :
IntervalIntegrable f μ (a 0) (a n) :=
trans_iterate_Ico bot_le fun k hk => hint k hk.2
#align interval_integrable.trans_iterate IntervalIntegrable.trans_iterate
theorem neg (h : IntervalIntegrable f μ a b) : IntervalIntegrable (-f) μ a b :=
⟨h.1.neg, h.2.neg⟩
#align interval_integrable.neg IntervalIntegrable.neg
theorem norm (h : IntervalIntegrable f μ a b) : IntervalIntegrable (fun x => ‖f x‖) μ a b :=
⟨h.1.norm, h.2.norm⟩
#align interval_integrable.norm IntervalIntegrable.norm
theorem intervalIntegrable_norm_iff {f : ℝ → E} {μ : Measure ℝ} {a b : ℝ}
(hf : AEStronglyMeasurable f (μ.restrict (Ι a b))) :
IntervalIntegrable (fun t => ‖f t‖) μ a b ↔ IntervalIntegrable f μ a b := by
simp_rw [intervalIntegrable_iff, IntegrableOn]; exact integrable_norm_iff hf
#align interval_integrable.interval_integrable_norm_iff IntervalIntegrable.intervalIntegrable_norm_iff
theorem abs {f : ℝ → ℝ} (h : IntervalIntegrable f μ a b) :
IntervalIntegrable (fun x => |f x|) μ a b :=
h.norm
#align interval_integrable.abs IntervalIntegrable.abs
theorem mono (hf : IntervalIntegrable f ν a b) (h1 : [[c, d]] ⊆ [[a, b]]) (h2 : μ ≤ ν) :
IntervalIntegrable f μ c d :=
intervalIntegrable_iff.mpr <| hf.def'.mono (uIoc_subset_uIoc_of_uIcc_subset_uIcc h1) h2
#align interval_integrable.mono IntervalIntegrable.mono
theorem mono_measure (hf : IntervalIntegrable f ν a b) (h : μ ≤ ν) : IntervalIntegrable f μ a b :=
hf.mono Subset.rfl h
#align interval_integrable.mono_measure IntervalIntegrable.mono_measure
theorem mono_set (hf : IntervalIntegrable f μ a b) (h : [[c, d]] ⊆ [[a, b]]) :
IntervalIntegrable f μ c d :=
hf.mono h le_rfl
#align interval_integrable.mono_set IntervalIntegrable.mono_set
theorem mono_set_ae (hf : IntervalIntegrable f μ a b) (h : Ι c d ≤ᵐ[μ] Ι a b) :
IntervalIntegrable f μ c d :=
intervalIntegrable_iff.mpr <| hf.def'.mono_set_ae h
#align interval_integrable.mono_set_ae IntervalIntegrable.mono_set_ae
theorem mono_set' (hf : IntervalIntegrable f μ a b) (hsub : Ι c d ⊆ Ι a b) :
IntervalIntegrable f μ c d :=
hf.mono_set_ae <| eventually_of_forall hsub
#align interval_integrable.mono_set' IntervalIntegrable.mono_set'
theorem mono_fun [NormedAddCommGroup F] {g : ℝ → F} (hf : IntervalIntegrable f μ a b)
(hgm : AEStronglyMeasurable g (μ.restrict (Ι a b)))
(hle : (fun x => ‖g x‖) ≤ᵐ[μ.restrict (Ι a b)] fun x => ‖f x‖) : IntervalIntegrable g μ a b :=
intervalIntegrable_iff.2 <| hf.def'.integrable.mono hgm hle
#align interval_integrable.mono_fun IntervalIntegrable.mono_fun
theorem mono_fun' {g : ℝ → ℝ} (hg : IntervalIntegrable g μ a b)
(hfm : AEStronglyMeasurable f (μ.restrict (Ι a b)))
(hle : (fun x => ‖f x‖) ≤ᵐ[μ.restrict (Ι a b)] g) : IntervalIntegrable f μ a b :=
intervalIntegrable_iff.2 <| hg.def'.integrable.mono' hfm hle
#align interval_integrable.mono_fun' IntervalIntegrable.mono_fun'
protected theorem aestronglyMeasurable (h : IntervalIntegrable f μ a b) :
AEStronglyMeasurable f (μ.restrict (Ioc a b)) :=
h.1.aestronglyMeasurable
#align interval_integrable.ae_strongly_measurable IntervalIntegrable.aestronglyMeasurable
protected theorem aestronglyMeasurable' (h : IntervalIntegrable f μ a b) :
AEStronglyMeasurable f (μ.restrict (Ioc b a)) :=
h.2.aestronglyMeasurable
#align interval_integrable.ae_strongly_measurable' IntervalIntegrable.aestronglyMeasurable'
end
variable [NormedRing A] {f g : ℝ → E} {a b : ℝ} {μ : Measure ℝ}
theorem smul [NormedField 𝕜] [NormedSpace 𝕜 E] {f : ℝ → E} {a b : ℝ} {μ : Measure ℝ}
(h : IntervalIntegrable f μ a b) (r : 𝕜) : IntervalIntegrable (r • f) μ a b :=
⟨h.1.smul r, h.2.smul r⟩
#align interval_integrable.smul IntervalIntegrable.smul
@[simp]
theorem add (hf : IntervalIntegrable f μ a b) (hg : IntervalIntegrable g μ a b) :
IntervalIntegrable (fun x => f x + g x) μ a b :=
⟨hf.1.add hg.1, hf.2.add hg.2⟩
#align interval_integrable.add IntervalIntegrable.add
@[simp]
theorem sub (hf : IntervalIntegrable f μ a b) (hg : IntervalIntegrable g μ a b) :
IntervalIntegrable (fun x => f x - g x) μ a b :=
⟨hf.1.sub hg.1, hf.2.sub hg.2⟩
#align interval_integrable.sub IntervalIntegrable.sub
theorem sum (s : Finset ι) {f : ι → ℝ → E} (h : ∀ i ∈ s, IntervalIntegrable (f i) μ a b) :
IntervalIntegrable (∑ i ∈ s, f i) μ a b :=
⟨integrable_finset_sum' s fun i hi => (h i hi).1, integrable_finset_sum' s fun i hi => (h i hi).2⟩
#align interval_integrable.sum IntervalIntegrable.sum
theorem mul_continuousOn {f g : ℝ → A} (hf : IntervalIntegrable f μ a b)
(hg : ContinuousOn g [[a, b]]) : IntervalIntegrable (fun x => f x * g x) μ a b := by
rw [intervalIntegrable_iff] at hf ⊢
exact hf.mul_continuousOn_of_subset hg measurableSet_Ioc isCompact_uIcc Ioc_subset_Icc_self
#align interval_integrable.mul_continuous_on IntervalIntegrable.mul_continuousOn
theorem continuousOn_mul {f g : ℝ → A} (hf : IntervalIntegrable f μ a b)
(hg : ContinuousOn g [[a, b]]) : IntervalIntegrable (fun x => g x * f x) μ a b := by
rw [intervalIntegrable_iff] at hf ⊢
exact hf.continuousOn_mul_of_subset hg isCompact_uIcc measurableSet_Ioc Ioc_subset_Icc_self
#align interval_integrable.continuous_on_mul IntervalIntegrable.continuousOn_mul
@[simp]
theorem const_mul {f : ℝ → A} (hf : IntervalIntegrable f μ a b) (c : A) :
IntervalIntegrable (fun x => c * f x) μ a b :=
hf.continuousOn_mul continuousOn_const
#align interval_integrable.const_mul IntervalIntegrable.const_mul
@[simp]
theorem mul_const {f : ℝ → A} (hf : IntervalIntegrable f μ a b) (c : A) :
IntervalIntegrable (fun x => f x * c) μ a b :=
hf.mul_continuousOn continuousOn_const
#align interval_integrable.mul_const IntervalIntegrable.mul_const
@[simp]
theorem div_const {𝕜 : Type*} {f : ℝ → 𝕜} [NormedField 𝕜] (h : IntervalIntegrable f μ a b)
(c : 𝕜) : IntervalIntegrable (fun x => f x / c) μ a b := by
simpa only [div_eq_mul_inv] using mul_const h c⁻¹
#align interval_integrable.div_const IntervalIntegrable.div_const
| Mathlib/MeasureTheory/Integral/IntervalIntegral.lean | 308 | 319 | theorem comp_mul_left (hf : IntervalIntegrable f volume a b) (c : ℝ) :
IntervalIntegrable (fun x => f (c * x)) volume (a / c) (b / c) := by |
rcases eq_or_ne c 0 with (hc | hc); · rw [hc]; simp
rw [intervalIntegrable_iff'] at hf ⊢
have A : MeasurableEmbedding fun x => x * c⁻¹ :=
(Homeomorph.mulRight₀ _ (inv_ne_zero hc)).closedEmbedding.measurableEmbedding
rw [← Real.smul_map_volume_mul_right (inv_ne_zero hc), IntegrableOn, Measure.restrict_smul,
integrable_smul_measure (by simpa : ENNReal.ofReal |c⁻¹| ≠ 0) ENNReal.ofReal_ne_top,
← IntegrableOn, MeasurableEmbedding.integrableOn_map_iff A]
convert hf using 1
· ext; simp only [comp_apply]; congr 1; field_simp
· rw [preimage_mul_const_uIcc (inv_ne_zero hc)]; field_simp [hc]
|
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]
| Mathlib/Geometry/Euclidean/Angle/Oriented/Basic.lean | 68 | 68 | theorem oangle_zero_left (x : V) : o.oangle 0 x = 0 := by | simp [oangle]
|
import Mathlib.Data.ZMod.Basic
import Mathlib.GroupTheory.Coxeter.Basic
namespace CoxeterSystem
open List Matrix Function Classical
variable {B : Type*}
variable {W : Type*} [Group W]
variable {M : CoxeterMatrix B} (cs : CoxeterSystem M W)
local prefix:100 "s" => cs.simple
local prefix:100 "π" => cs.wordProd
private theorem exists_word_with_prod (w : W) : ∃ n ω, ω.length = n ∧ π ω = w := by
rcases cs.wordProd_surjective w with ⟨ω, rfl⟩
use ω.length, ω
noncomputable def length (w : W) : ℕ := Nat.find (cs.exists_word_with_prod w)
local prefix:100 "ℓ" => cs.length
theorem exists_reduced_word (w : W) : ∃ ω, ω.length = ℓ w ∧ w = π ω := by
have := Nat.find_spec (cs.exists_word_with_prod w)
tauto
theorem length_wordProd_le (ω : List B) : ℓ (π ω) ≤ ω.length :=
Nat.find_min' (cs.exists_word_with_prod (π ω)) ⟨ω, by tauto⟩
@[simp] theorem length_one : ℓ (1 : W) = 0 := Nat.eq_zero_of_le_zero (cs.length_wordProd_le [])
@[simp]
theorem length_eq_zero_iff {w : W} : ℓ w = 0 ↔ w = 1 := by
constructor
· intro h
rcases cs.exists_reduced_word w with ⟨ω, hω, rfl⟩
have : ω = [] := eq_nil_of_length_eq_zero (hω.trans h)
rw [this, wordProd_nil]
· rintro rfl
exact cs.length_one
@[simp]
theorem length_inv (w : W) : ℓ (w⁻¹) = ℓ w := by
apply Nat.le_antisymm
· rcases cs.exists_reduced_word w with ⟨ω, hω, rfl⟩
have := cs.length_wordProd_le (List.reverse ω)
rwa [wordProd_reverse, length_reverse, hω] at this
· rcases cs.exists_reduced_word w⁻¹ with ⟨ω, hω, h'ω⟩
have := cs.length_wordProd_le (List.reverse ω)
rwa [wordProd_reverse, length_reverse, ← h'ω, hω, inv_inv] at this
theorem length_mul_le (w₁ w₂ : W) :
ℓ (w₁ * w₂) ≤ ℓ w₁ + ℓ w₂ := by
rcases cs.exists_reduced_word w₁ with ⟨ω₁, hω₁, rfl⟩
rcases cs.exists_reduced_word w₂ with ⟨ω₂, hω₂, rfl⟩
have := cs.length_wordProd_le (ω₁ ++ ω₂)
simpa [hω₁, hω₂, wordProd_append] using this
theorem length_mul_ge_length_sub_length (w₁ w₂ : W) :
ℓ w₁ - ℓ w₂ ≤ ℓ (w₁ * w₂) := by
simpa [Nat.sub_le_of_le_add] using cs.length_mul_le (w₁ * w₂) w₂⁻¹
theorem length_mul_ge_length_sub_length' (w₁ w₂ : W) :
ℓ w₂ - ℓ w₁ ≤ ℓ (w₁ * w₂) := by
simpa [Nat.sub_le_of_le_add, add_comm] using cs.length_mul_le w₁⁻¹ (w₁ * w₂)
theorem length_mul_ge_max (w₁ w₂ : W) :
max (ℓ w₁ - ℓ w₂) (ℓ w₂ - ℓ w₁) ≤ ℓ (w₁ * w₂) :=
max_le_iff.mpr ⟨length_mul_ge_length_sub_length _ _ _, length_mul_ge_length_sub_length' _ _ _⟩
def lengthParity : W →* Multiplicative (ZMod 2) := cs.lift ⟨fun _ ↦ Multiplicative.ofAdd 1, by
simp_rw [CoxeterMatrix.IsLiftable, ← ofAdd_add, (by decide : (1 + 1 : ZMod 2) = 0)]
simp⟩
theorem lengthParity_simple (i : B):
cs.lengthParity (s i) = Multiplicative.ofAdd 1 := cs.lift_apply_simple _ _
theorem lengthParity_comp_simple :
cs.lengthParity ∘ cs.simple = fun _ ↦ Multiplicative.ofAdd 1 := funext cs.lengthParity_simple
theorem lengthParity_eq_ofAdd_length (w : W) :
cs.lengthParity w = Multiplicative.ofAdd (↑(ℓ w)) := by
rcases cs.exists_reduced_word w with ⟨ω, hω, rfl⟩
rw [← hω, wordProd, map_list_prod, List.map_map, lengthParity_comp_simple, map_const',
prod_replicate, ← ofAdd_nsmul, nsmul_one]
theorem length_mul_mod_two (w₁ w₂ : W) : ℓ (w₁ * w₂) % 2 = (ℓ w₁ + ℓ w₂) % 2 := by
rw [← ZMod.natCast_eq_natCast_iff', Nat.cast_add]
simpa only [lengthParity_eq_ofAdd_length, ofAdd_add] using map_mul cs.lengthParity w₁ w₂
@[simp]
theorem length_simple (i : B) : ℓ (s i) = 1 := by
apply Nat.le_antisymm
· simpa using cs.length_wordProd_le [i]
· by_contra! length_lt_one
have : cs.lengthParity (s i) = Multiplicative.ofAdd 0 := by
rw [lengthParity_eq_ofAdd_length, Nat.lt_one_iff.mp length_lt_one, Nat.cast_zero]
have : Multiplicative.ofAdd (0 : ZMod 2) = Multiplicative.ofAdd 1 :=
this.symm.trans (cs.lengthParity_simple i)
contradiction
theorem length_eq_one_iff {w : W} : ℓ w = 1 ↔ ∃ i : B, w = s i := by
constructor
· intro h
rcases cs.exists_reduced_word w with ⟨ω, hω, rfl⟩
rcases List.length_eq_one.mp (hω.trans h) with ⟨i, rfl⟩
exact ⟨i, cs.wordProd_singleton i⟩
· rintro ⟨i, rfl⟩
exact cs.length_simple i
theorem length_mul_simple_ne (w : W) (i : B) : ℓ (w * s i) ≠ ℓ w := by
intro eq
have length_mod_two := cs.length_mul_mod_two w (s i)
rw [eq, length_simple] at length_mod_two
rcases Nat.mod_two_eq_zero_or_one (ℓ w) with even | odd
· rw [even, Nat.succ_mod_two_eq_one_iff.mpr even] at length_mod_two
contradiction
· rw [odd, Nat.succ_mod_two_eq_zero_iff.mpr odd] at length_mod_two
contradiction
theorem length_simple_mul_ne (w : W) (i : B) : ℓ (s i * w) ≠ ℓ w := by
convert cs.length_mul_simple_ne w⁻¹ i using 1
· convert cs.length_inv ?_ using 2
simp
· simp
theorem length_mul_simple (w : W) (i : B) :
ℓ (w * s i) = ℓ w + 1 ∨ ℓ (w * s i) + 1 = ℓ w := by
rcases Nat.lt_or_gt_of_ne (cs.length_mul_simple_ne w i) with lt | gt
· -- lt : ℓ (w * s i) < ℓ w
right
have length_ge := cs.length_mul_ge_length_sub_length w (s i)
simp only [length_simple, tsub_le_iff_right] at length_ge
-- length_ge : ℓ w ≤ ℓ (w * s i) + 1
linarith
· -- gt : ℓ w < ℓ (w * s i)
left
have length_le := cs.length_mul_le w (s i)
simp only [length_simple] at length_le
-- length_le : ℓ (w * s i) ≤ ℓ w + 1
linarith
theorem length_simple_mul (w : W) (i : B) :
ℓ (s i * w) = ℓ w + 1 ∨ ℓ (s i * w) + 1 = ℓ w := by
have := cs.length_mul_simple w⁻¹ i
rwa [(by simp : w⁻¹ * (s i) = ((s i) * w)⁻¹), length_inv, length_inv] at this
def IsReduced (ω : List B) : Prop := ℓ (π ω) = ω.length
@[simp]
theorem isReduced_reverse (ω : List B) : cs.IsReduced (ω.reverse) ↔ cs.IsReduced ω := by
simp [IsReduced]
theorem exists_reduced_word' (w : W) : ∃ ω : List B, cs.IsReduced ω ∧ w = π ω := by
rcases cs.exists_reduced_word w with ⟨ω, hω, rfl⟩
use ω
tauto
private theorem isReduced_take_and_drop {ω : List B} (hω : cs.IsReduced ω) (j : ℕ) :
cs.IsReduced (ω.take j) ∧ cs.IsReduced (ω.drop j) := by
have h₁ : ℓ (π (ω.take j)) ≤ (ω.take j).length := cs.length_wordProd_le (ω.take j)
have h₂ : ℓ (π (ω.drop j)) ≤ (ω.drop j).length := cs.length_wordProd_le (ω.drop j)
have h₃ := calc
(ω.take j).length + (ω.drop j).length
_ = ω.length := by rw [← List.length_append, ω.take_append_drop j];
_ = ℓ (π ω) := hω.symm
_ = ℓ (π (ω.take j) * π (ω.drop j)) := by rw [← cs.wordProd_append, ω.take_append_drop j];
_ ≤ ℓ (π (ω.take j)) + ℓ (π (ω.drop j)) := cs.length_mul_le _ _
unfold IsReduced
exact ⟨by linarith, by linarith⟩
theorem isReduced_take {ω : List B} (hω : cs.IsReduced ω) (j : ℕ) : cs.IsReduced (ω.take j) :=
(isReduced_take_and_drop _ hω _).1
theorem isReduced_drop {ω : List B} (hω : cs.IsReduced ω) (j : ℕ) : cs.IsReduced (ω.drop j) :=
(isReduced_take_and_drop _ hω _).2
theorem not_isReduced_alternatingWord (i i' : B) {m : ℕ} (hM : M i i' ≠ 0) (hm : m > M i i') :
¬cs.IsReduced (alternatingWord i i' m) := by
induction' hm with m _ ih
· -- Base case; m = M i i' + 1
suffices h : ℓ (π (alternatingWord i i' (M i i' + 1))) < M i i' + 1 by
unfold IsReduced
rw [Nat.succ_eq_add_one, length_alternatingWord]
linarith
have : M i i' + 1 ≤ M i i' * 2 := by linarith [Nat.one_le_iff_ne_zero.mpr hM]
rw [cs.prod_alternatingWord_eq_prod_alternatingWord_sub i i' _ this]
have : M i i' * 2 - (M i i' + 1) = M i i' - 1 := by
apply (Nat.sub_eq_iff_eq_add' this).mpr
rw [add_assoc, add_comm 1, Nat.sub_add_cancel (Nat.one_le_iff_ne_zero.mpr hM)]
exact mul_two _
rw [this]
calc
ℓ (π (alternatingWord i' i (M i i' - 1)))
_ ≤ (alternatingWord i' i (M i i' - 1)).length := cs.length_wordProd_le _
_ = M i i' - 1 := length_alternatingWord _ _ _
_ ≤ M i i' := Nat.sub_le _ _
_ < M i i' + 1 := Nat.lt_succ_self _
· -- Inductive step
contrapose! ih
rw [alternatingWord_succ'] at ih
apply isReduced_drop (j := 1) at ih
simpa using ih
def IsLeftDescent (w : W) (i : B) : Prop := ℓ (s i * w) < ℓ w
def IsRightDescent (w : W) (i : B) : Prop := ℓ (w * s i) < ℓ w
theorem not_isLeftDescent_one (i : B) : ¬cs.IsLeftDescent 1 i := by simp [IsLeftDescent]
theorem not_isRightDescent_one (i : B) : ¬cs.IsRightDescent 1 i := by simp [IsRightDescent]
theorem isLeftDescent_inv_iff {w : W} {i : B} :
cs.IsLeftDescent w⁻¹ i ↔ cs.IsRightDescent w i := by
unfold IsLeftDescent IsRightDescent
nth_rw 1 [← length_inv]
simp
theorem isRightDescent_inv_iff {w : W} {i : B} :
cs.IsRightDescent w⁻¹ i ↔ cs.IsLeftDescent w i := by
simpa using (cs.isLeftDescent_inv_iff (w := w⁻¹)).symm
| Mathlib/GroupTheory/Coxeter/Length.lean | 281 | 289 | theorem exists_leftDescent_of_ne_one {w : W} (hw : w ≠ 1) : ∃ i : B, cs.IsLeftDescent w i := by |
rcases cs.exists_reduced_word w with ⟨ω, h, rfl⟩
have h₁ : ω ≠ [] := by rintro rfl; simp at hw
rcases List.exists_cons_of_ne_nil h₁ with ⟨i, ω', rfl⟩
use i
rw [IsLeftDescent, ← h, wordProd_cons, simple_mul_simple_cancel_left]
calc
ℓ (π ω') ≤ ω'.length := cs.length_wordProd_le ω'
_ < (i :: ω').length := by simp
|
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]
theorem degree_of_subsingleton [Subsingleton R] : degree p = ⊥ := by
rw [Subsingleton.elim p 0, degree_zero]
#align polynomial.degree_of_subsingleton Polynomial.degree_of_subsingleton
@[nontriviality]
| Mathlib/Algebra/Polynomial/Degree/Definitions.lean | 128 | 129 | theorem natDegree_of_subsingleton [Subsingleton R] : natDegree p = 0 := by |
rw [Subsingleton.elim p 0, natDegree_zero]
|
import Mathlib.SetTheory.Ordinal.Arithmetic
#align_import set_theory.ordinal.exponential from "leanprover-community/mathlib"@"b67044ba53af18680e1dd246861d9584e968495d"
noncomputable section
open Function Cardinal Set Equiv Order
open scoped Classical
open Cardinal Ordinal
universe u v w
namespace Ordinal
instance pow : Pow Ordinal Ordinal :=
⟨fun a b => if a = 0 then 1 - b else limitRecOn b 1 (fun _ IH => IH * a) fun b _ => bsup.{u, u} b⟩
-- Porting note: Ambiguous notations.
-- local infixr:0 "^" => @Pow.pow Ordinal Ordinal Ordinal.instPowOrdinalOrdinal
theorem opow_def (a b : Ordinal) :
a ^ b = if a = 0 then 1 - b else limitRecOn b 1 (fun _ IH => IH * a) fun b _ => bsup.{u, u} b :=
rfl
#align ordinal.opow_def Ordinal.opow_def
-- Porting note: `if_pos rfl` → `if_true`
theorem zero_opow' (a : Ordinal) : 0 ^ a = 1 - a := by simp only [opow_def, if_true]
#align ordinal.zero_opow' Ordinal.zero_opow'
@[simp]
theorem zero_opow {a : Ordinal} (a0 : a ≠ 0) : (0 : Ordinal) ^ a = 0 := by
rwa [zero_opow', Ordinal.sub_eq_zero_iff_le, one_le_iff_ne_zero]
#align ordinal.zero_opow Ordinal.zero_opow
@[simp]
theorem opow_zero (a : Ordinal) : a ^ (0 : Ordinal) = 1 := by
by_cases h : a = 0
· simp only [opow_def, if_pos h, sub_zero]
· simp only [opow_def, if_neg h, limitRecOn_zero]
#align ordinal.opow_zero Ordinal.opow_zero
@[simp]
theorem opow_succ (a b : Ordinal) : a ^ succ b = a ^ b * a :=
if h : a = 0 then by subst a; simp only [zero_opow (succ_ne_zero _), mul_zero]
else by simp only [opow_def, limitRecOn_succ, if_neg h]
#align ordinal.opow_succ Ordinal.opow_succ
theorem opow_limit {a b : Ordinal} (a0 : a ≠ 0) (h : IsLimit b) :
a ^ b = bsup.{u, u} b fun c _ => a ^ c := by
simp only [opow_def, if_neg a0]; rw [limitRecOn_limit _ _ _ _ h]
#align ordinal.opow_limit Ordinal.opow_limit
theorem opow_le_of_limit {a b c : Ordinal} (a0 : a ≠ 0) (h : IsLimit b) :
a ^ b ≤ c ↔ ∀ b' < b, a ^ b' ≤ c := by rw [opow_limit a0 h, bsup_le_iff]
#align ordinal.opow_le_of_limit Ordinal.opow_le_of_limit
theorem lt_opow_of_limit {a b c : Ordinal} (b0 : b ≠ 0) (h : IsLimit c) :
a < b ^ c ↔ ∃ c' < c, a < b ^ c' := by
rw [← not_iff_not, not_exists]; simp only [not_lt, opow_le_of_limit b0 h, exists_prop, not_and]
#align ordinal.lt_opow_of_limit Ordinal.lt_opow_of_limit
@[simp]
theorem opow_one (a : Ordinal) : a ^ (1 : Ordinal) = a := by
rw [← succ_zero, opow_succ]; simp only [opow_zero, one_mul]
#align ordinal.opow_one Ordinal.opow_one
@[simp]
theorem one_opow (a : Ordinal) : (1 : Ordinal) ^ a = 1 := by
induction a using limitRecOn with
| H₁ => simp only [opow_zero]
| H₂ _ ih =>
simp only [opow_succ, ih, mul_one]
| H₃ b l IH =>
refine eq_of_forall_ge_iff fun c => ?_
rw [opow_le_of_limit Ordinal.one_ne_zero l]
exact ⟨fun H => by simpa only [opow_zero] using H 0 l.pos, fun H b' h => by rwa [IH _ h]⟩
#align ordinal.one_opow Ordinal.one_opow
theorem opow_pos {a : Ordinal} (b : Ordinal) (a0 : 0 < a) : 0 < a ^ b := by
have h0 : 0 < a ^ (0 : Ordinal) := by simp only [opow_zero, zero_lt_one]
induction b using limitRecOn with
| H₁ => exact h0
| H₂ b IH =>
rw [opow_succ]
exact mul_pos IH a0
| H₃ b l _ =>
exact (lt_opow_of_limit (Ordinal.pos_iff_ne_zero.1 a0) l).2 ⟨0, l.pos, h0⟩
#align ordinal.opow_pos Ordinal.opow_pos
theorem opow_ne_zero {a : Ordinal} (b : Ordinal) (a0 : a ≠ 0) : a ^ b ≠ 0 :=
Ordinal.pos_iff_ne_zero.1 <| opow_pos b <| Ordinal.pos_iff_ne_zero.2 a0
#align ordinal.opow_ne_zero Ordinal.opow_ne_zero
theorem opow_isNormal {a : Ordinal} (h : 1 < a) : IsNormal (a ^ ·) :=
have a0 : 0 < a := zero_lt_one.trans h
⟨fun b => by simpa only [mul_one, opow_succ] using (mul_lt_mul_iff_left (opow_pos b a0)).2 h,
fun b l c => opow_le_of_limit (ne_of_gt a0) l⟩
#align ordinal.opow_is_normal Ordinal.opow_isNormal
theorem opow_lt_opow_iff_right {a b c : Ordinal} (a1 : 1 < a) : a ^ b < a ^ c ↔ b < c :=
(opow_isNormal a1).lt_iff
#align ordinal.opow_lt_opow_iff_right Ordinal.opow_lt_opow_iff_right
theorem opow_le_opow_iff_right {a b c : Ordinal} (a1 : 1 < a) : a ^ b ≤ a ^ c ↔ b ≤ c :=
(opow_isNormal a1).le_iff
#align ordinal.opow_le_opow_iff_right Ordinal.opow_le_opow_iff_right
theorem opow_right_inj {a b c : Ordinal} (a1 : 1 < a) : a ^ b = a ^ c ↔ b = c :=
(opow_isNormal a1).inj
#align ordinal.opow_right_inj Ordinal.opow_right_inj
theorem opow_isLimit {a b : Ordinal} (a1 : 1 < a) : IsLimit b → IsLimit (a ^ b) :=
(opow_isNormal a1).isLimit
#align ordinal.opow_is_limit Ordinal.opow_isLimit
theorem opow_isLimit_left {a b : Ordinal} (l : IsLimit a) (hb : b ≠ 0) : IsLimit (a ^ b) := by
rcases zero_or_succ_or_limit b with (e | ⟨b, rfl⟩ | l')
· exact absurd e hb
· rw [opow_succ]
exact mul_isLimit (opow_pos _ l.pos) l
· exact opow_isLimit l.one_lt l'
#align ordinal.opow_is_limit_left Ordinal.opow_isLimit_left
theorem opow_le_opow_right {a b c : Ordinal} (h₁ : 0 < a) (h₂ : b ≤ c) : a ^ b ≤ a ^ c := by
rcases lt_or_eq_of_le (one_le_iff_pos.2 h₁) with h₁ | h₁
· exact (opow_le_opow_iff_right h₁).2 h₂
· subst a
-- Porting note: `le_refl` is required.
simp only [one_opow, le_refl]
#align ordinal.opow_le_opow_right Ordinal.opow_le_opow_right
theorem opow_le_opow_left {a b : Ordinal} (c : Ordinal) (ab : a ≤ b) : a ^ c ≤ b ^ c := by
by_cases a0 : a = 0
-- Porting note: `le_refl` is required.
· subst a
by_cases c0 : c = 0
· subst c
simp only [opow_zero, le_refl]
· simp only [zero_opow c0, Ordinal.zero_le]
· induction c using limitRecOn with
| H₁ => simp only [opow_zero, le_refl]
| H₂ c IH =>
simpa only [opow_succ] using mul_le_mul' IH ab
| H₃ c l IH =>
exact
(opow_le_of_limit a0 l).2 fun b' h =>
(IH _ h).trans (opow_le_opow_right ((Ordinal.pos_iff_ne_zero.2 a0).trans_le ab) h.le)
#align ordinal.opow_le_opow_left Ordinal.opow_le_opow_left
theorem left_le_opow (a : Ordinal) {b : Ordinal} (b1 : 0 < b) : a ≤ a ^ b := by
nth_rw 1 [← opow_one a]
cases' le_or_gt a 1 with a1 a1
· rcases lt_or_eq_of_le a1 with a0 | a1
· rw [lt_one_iff_zero] at a0
rw [a0, zero_opow Ordinal.one_ne_zero]
exact Ordinal.zero_le _
rw [a1, one_opow, one_opow]
rwa [opow_le_opow_iff_right a1, one_le_iff_pos]
#align ordinal.left_le_opow Ordinal.left_le_opow
theorem right_le_opow {a : Ordinal} (b : Ordinal) (a1 : 1 < a) : b ≤ a ^ b :=
(opow_isNormal a1).self_le _
#align ordinal.right_le_opow Ordinal.right_le_opow
theorem opow_lt_opow_left_of_succ {a b c : Ordinal} (ab : a < b) : a ^ succ c < b ^ succ c := by
rw [opow_succ, opow_succ]
exact
(mul_le_mul_right' (opow_le_opow_left c ab.le) a).trans_lt
(mul_lt_mul_of_pos_left ab (opow_pos c ((Ordinal.zero_le a).trans_lt ab)))
#align ordinal.opow_lt_opow_left_of_succ Ordinal.opow_lt_opow_left_of_succ
theorem opow_add (a b c : Ordinal) : a ^ (b + c) = a ^ b * a ^ c := by
rcases eq_or_ne a 0 with (rfl | a0)
· rcases eq_or_ne c 0 with (rfl | c0)
· simp
have : b + c ≠ 0 := ((Ordinal.pos_iff_ne_zero.2 c0).trans_le (le_add_left _ _)).ne'
simp only [zero_opow c0, zero_opow this, mul_zero]
rcases eq_or_lt_of_le (one_le_iff_ne_zero.2 a0) with (rfl | a1)
· simp only [one_opow, mul_one]
induction c using limitRecOn with
| H₁ => simp
| H₂ c IH =>
rw [add_succ, opow_succ, IH, opow_succ, mul_assoc]
| H₃ c l IH =>
refine
eq_of_forall_ge_iff fun d =>
(((opow_isNormal a1).trans (add_isNormal b)).limit_le l).trans ?_
dsimp only [Function.comp_def]
simp (config := { contextual := true }) only [IH]
exact
(((mul_isNormal <| opow_pos b (Ordinal.pos_iff_ne_zero.2 a0)).trans
(opow_isNormal a1)).limit_le
l).symm
#align ordinal.opow_add Ordinal.opow_add
theorem opow_one_add (a b : Ordinal) : a ^ (1 + b) = a * a ^ b := by rw [opow_add, opow_one]
#align ordinal.opow_one_add Ordinal.opow_one_add
theorem opow_dvd_opow (a : Ordinal) {b c : Ordinal} (h : b ≤ c) : a ^ b ∣ a ^ c :=
⟨a ^ (c - b), by rw [← opow_add, Ordinal.add_sub_cancel_of_le h]⟩
#align ordinal.opow_dvd_opow Ordinal.opow_dvd_opow
theorem opow_dvd_opow_iff {a b c : Ordinal} (a1 : 1 < a) : a ^ b ∣ a ^ c ↔ b ≤ c :=
⟨fun h =>
le_of_not_lt fun hn =>
not_le_of_lt ((opow_lt_opow_iff_right a1).2 hn) <|
le_of_dvd (opow_ne_zero _ <| one_le_iff_ne_zero.1 <| a1.le) h,
opow_dvd_opow _⟩
#align ordinal.opow_dvd_opow_iff Ordinal.opow_dvd_opow_iff
theorem opow_mul (a b c : Ordinal) : a ^ (b * c) = (a ^ b) ^ c := by
by_cases b0 : b = 0; · simp only [b0, zero_mul, opow_zero, one_opow]
by_cases a0 : a = 0
· subst a
by_cases c0 : c = 0
· simp only [c0, mul_zero, opow_zero]
simp only [zero_opow b0, zero_opow c0, zero_opow (mul_ne_zero b0 c0)]
cases' eq_or_lt_of_le (one_le_iff_ne_zero.2 a0) with a1 a1
· subst a1
simp only [one_opow]
induction c using limitRecOn with
| H₁ => simp only [mul_zero, opow_zero]
| H₂ c IH =>
rw [mul_succ, opow_add, IH, opow_succ]
| H₃ c l IH =>
refine
eq_of_forall_ge_iff fun d =>
(((opow_isNormal a1).trans (mul_isNormal (Ordinal.pos_iff_ne_zero.2 b0))).limit_le
l).trans
?_
dsimp only [Function.comp_def]
simp (config := { contextual := true }) only [IH]
exact (opow_le_of_limit (opow_ne_zero _ a0) l).symm
#align ordinal.opow_mul Ordinal.opow_mul
-- @[pp_nodot] -- Porting note: Unknown attribute.
def log (b : Ordinal) (x : Ordinal) : Ordinal :=
if _h : 1 < b then pred (sInf { o | x < b ^ o }) else 0
#align ordinal.log Ordinal.log
theorem log_nonempty {b x : Ordinal} (h : 1 < b) : { o : Ordinal | x < b ^ o }.Nonempty :=
⟨_, succ_le_iff.1 (right_le_opow _ h)⟩
#align ordinal.log_nonempty Ordinal.log_nonempty
theorem log_def {b : Ordinal} (h : 1 < b) (x : Ordinal) :
log b x = pred (sInf { o | x < b ^ o }) := by simp only [log, dif_pos h]
#align ordinal.log_def Ordinal.log_def
theorem log_of_not_one_lt_left {b : Ordinal} (h : ¬1 < b) (x : Ordinal) : log b x = 0 := by
simp only [log, dif_neg h]
#align ordinal.log_of_not_one_lt_left Ordinal.log_of_not_one_lt_left
theorem log_of_left_le_one {b : Ordinal} (h : b ≤ 1) : ∀ x, log b x = 0 :=
log_of_not_one_lt_left h.not_lt
#align ordinal.log_of_left_le_one Ordinal.log_of_left_le_one
@[simp]
theorem log_zero_left : ∀ b, log 0 b = 0 :=
log_of_left_le_one zero_le_one
#align ordinal.log_zero_left Ordinal.log_zero_left
@[simp]
theorem log_zero_right (b : Ordinal) : log b 0 = 0 :=
if b1 : 1 < b then by
rw [log_def b1, ← Ordinal.le_zero, pred_le]
apply csInf_le'
dsimp
rw [succ_zero, opow_one]
exact zero_lt_one.trans b1
else by simp only [log_of_not_one_lt_left b1]
#align ordinal.log_zero_right Ordinal.log_zero_right
@[simp]
theorem log_one_left : ∀ b, log 1 b = 0 :=
log_of_left_le_one le_rfl
#align ordinal.log_one_left Ordinal.log_one_left
theorem succ_log_def {b x : Ordinal} (hb : 1 < b) (hx : x ≠ 0) :
succ (log b x) = sInf { o : Ordinal | x < b ^ o } := by
let t := sInf { o : Ordinal | x < b ^ o }
have : x < (b^t) := csInf_mem (log_nonempty hb)
rcases zero_or_succ_or_limit t with (h | h | h)
· refine ((one_le_iff_ne_zero.2 hx).not_lt ?_).elim
simpa only [h, opow_zero] using this
· rw [show log b x = pred t from log_def hb x, succ_pred_iff_is_succ.2 h]
· rcases (lt_opow_of_limit (zero_lt_one.trans hb).ne' h).1 this with ⟨a, h₁, h₂⟩
exact h₁.not_le.elim ((le_csInf_iff'' (log_nonempty hb)).1 le_rfl a h₂)
#align ordinal.succ_log_def Ordinal.succ_log_def
theorem lt_opow_succ_log_self {b : Ordinal} (hb : 1 < b) (x : Ordinal) :
x < b ^ succ (log b x) := by
rcases eq_or_ne x 0 with (rfl | hx)
· apply opow_pos _ (zero_lt_one.trans hb)
· rw [succ_log_def hb hx]
exact csInf_mem (log_nonempty hb)
#align ordinal.lt_opow_succ_log_self Ordinal.lt_opow_succ_log_self
theorem opow_log_le_self (b : Ordinal) {x : Ordinal} (hx : x ≠ 0) : b ^ log b x ≤ x := by
rcases eq_or_ne b 0 with (rfl | b0)
· rw [zero_opow']
exact (sub_le_self _ _).trans (one_le_iff_ne_zero.2 hx)
rcases lt_or_eq_of_le (one_le_iff_ne_zero.2 b0) with (hb | rfl)
· refine le_of_not_lt fun h => (lt_succ (log b x)).not_le ?_
have := @csInf_le' _ _ { o | x < b ^ o } _ h
rwa [← succ_log_def hb hx] at this
· rwa [one_opow, one_le_iff_ne_zero]
#align ordinal.opow_log_le_self Ordinal.opow_log_le_self
theorem opow_le_iff_le_log {b x c : Ordinal} (hb : 1 < b) (hx : x ≠ 0) : b ^ c ≤ x ↔ c ≤ log b x :=
⟨fun h =>
le_of_not_lt fun hn =>
(lt_opow_succ_log_self hb x).not_le <|
((opow_le_opow_iff_right hb).2 (succ_le_of_lt hn)).trans h,
fun h => ((opow_le_opow_iff_right hb).2 h).trans (opow_log_le_self b hx)⟩
#align ordinal.opow_le_iff_le_log Ordinal.opow_le_iff_le_log
theorem lt_opow_iff_log_lt {b x c : Ordinal} (hb : 1 < b) (hx : x ≠ 0) : x < b ^ c ↔ log b x < c :=
lt_iff_lt_of_le_iff_le (opow_le_iff_le_log hb hx)
#align ordinal.lt_opow_iff_log_lt Ordinal.lt_opow_iff_log_lt
theorem log_pos {b o : Ordinal} (hb : 1 < b) (ho : o ≠ 0) (hbo : b ≤ o) : 0 < log b o := by
rwa [← succ_le_iff, succ_zero, ← opow_le_iff_le_log hb ho, opow_one]
#align ordinal.log_pos Ordinal.log_pos
theorem log_eq_zero {b o : Ordinal} (hbo : o < b) : log b o = 0 := by
rcases eq_or_ne o 0 with (rfl | ho)
· exact log_zero_right b
rcases le_or_lt b 1 with hb | hb
· rcases le_one_iff.1 hb with (rfl | rfl)
· exact log_zero_left o
· exact log_one_left o
· rwa [← Ordinal.le_zero, ← lt_succ_iff, succ_zero, ← lt_opow_iff_log_lt hb ho, opow_one]
#align ordinal.log_eq_zero Ordinal.log_eq_zero
@[mono]
theorem log_mono_right (b : Ordinal) {x y : Ordinal} (xy : x ≤ y) : log b x ≤ log b y :=
if hx : x = 0 then by simp only [hx, log_zero_right, Ordinal.zero_le]
else
if hb : 1 < b then
(opow_le_iff_le_log hb (lt_of_lt_of_le (Ordinal.pos_iff_ne_zero.2 hx) xy).ne').1 <|
(opow_log_le_self _ hx).trans xy
else by simp only [log_of_not_one_lt_left hb, Ordinal.zero_le]
#align ordinal.log_mono_right Ordinal.log_mono_right
theorem log_le_self (b x : Ordinal) : log b x ≤ x :=
if hx : x = 0 then by simp only [hx, log_zero_right, Ordinal.zero_le]
else
if hb : 1 < b then (right_le_opow _ hb).trans (opow_log_le_self b hx)
else by simp only [log_of_not_one_lt_left hb, Ordinal.zero_le]
#align ordinal.log_le_self Ordinal.log_le_self
@[simp]
theorem log_one_right (b : Ordinal) : log b 1 = 0 :=
if hb : 1 < b then log_eq_zero hb else log_of_not_one_lt_left hb 1
#align ordinal.log_one_right Ordinal.log_one_right
| Mathlib/SetTheory/Ordinal/Exponential.lean | 379 | 382 | theorem mod_opow_log_lt_self (b : Ordinal) {o : Ordinal} (ho : o ≠ 0) : o % (b ^ log b o) < o := by |
rcases eq_or_ne b 0 with (rfl | hb)
· simpa using Ordinal.pos_iff_ne_zero.2 ho
· exact (mod_lt _ <| opow_ne_zero _ hb).trans_le (opow_log_le_self _ ho)
|
import Mathlib.Algebra.GCDMonoid.Basic
import Mathlib.RingTheory.IntegrallyClosed
import Mathlib.RingTheory.Polynomial.Eisenstein.Basic
#align_import algebra.gcd_monoid.integrally_closed from "leanprover-community/mathlib"@"2032a878972d5672e7c27c957e7a6e297b044973"
open scoped Polynomial
variable {R A : Type*} [CommRing R] [IsDomain R] [CommRing A] [Algebra R A]
| Mathlib/Algebra/GCDMonoid/IntegrallyClosed.lean | 23 | 30 | theorem IsLocalization.surj_of_gcd_domain [GCDMonoid R] (M : Submonoid R) [IsLocalization M A]
(z : A) : ∃ a b : R, IsUnit (gcd a b) ∧ z * algebraMap R A b = algebraMap R A a := by |
obtain ⟨x, ⟨y, hy⟩, rfl⟩ := IsLocalization.mk'_surjective M z
obtain ⟨x', y', hx', hy', hu⟩ := extract_gcd x y
use x', y', hu
rw [mul_comm, IsLocalization.mul_mk'_eq_mk'_of_mul]
convert IsLocalization.mk'_mul_cancel_left (M := M) (S := A) _ _ using 2
rw [Subtype.coe_mk, hy', ← mul_comm y', mul_assoc]; conv_lhs => rw [hx']
|
import Mathlib.LinearAlgebra.Dimension.Finite
import Mathlib.LinearAlgebra.Dimension.Constructions
open Cardinal Submodule Set FiniteDimensional
universe u v
namespace Subalgebra
variable {F E : Type*} [CommRing F] [StrongRankCondition F] [Ring E] [Algebra F E]
{S : Subalgebra F E}
| Mathlib/LinearAlgebra/Dimension/FreeAndStrongRankCondition.lean | 262 | 274 | theorem eq_bot_of_rank_le_one (h : Module.rank F S ≤ 1) [Module.Free F S] : S = ⊥ := by |
nontriviality E
obtain ⟨κ, b⟩ := Module.Free.exists_basis (R := F) (M := S)
by_cases h1 : Module.rank F S = 1
· refine bot_unique fun x hx ↦ Algebra.mem_bot.2 ?_
rw [← b.mk_eq_rank'', eq_one_iff_unique, ← unique_iff_subsingleton_and_nonempty] at h1
obtain ⟨h1⟩ := h1
obtain ⟨y, hy⟩ := (bijective_algebraMap_of_linearEquiv (b.repr ≪≫ₗ
Finsupp.LinearEquiv.finsuppUnique _ _ _).symm).surjective ⟨x, hx⟩
exact ⟨y, congr(Subtype.val $(hy))⟩
haveI := mk_eq_zero_iff.1 (b.mk_eq_rank''.symm ▸ lt_one_iff_zero.1 (h.lt_of_ne h1))
haveI := b.repr.toEquiv.subsingleton
exact False.elim <| one_ne_zero congr(S.val $(Subsingleton.elim 1 0))
|
import Mathlib.Algebra.BigOperators.GroupWithZero.Finset
import Mathlib.Algebra.Group.Submonoid.Membership
import Mathlib.Algebra.Module.LinearMap.Basic
import Mathlib.Data.Finset.Preimage
import Mathlib.Data.Set.Finite
import Mathlib.GroupTheory.GroupAction.BigOperators
#align_import data.dfinsupp.basic from "leanprover-community/mathlib"@"6623e6af705e97002a9054c1c05a980180276fc1"
universe u u₁ u₂ v v₁ v₂ v₃ w x y l
variable {ι : Type u} {γ : Type w} {β : ι → Type v} {β₁ : ι → Type v₁} {β₂ : ι → Type v₂}
variable (β)
structure DFinsupp [∀ i, Zero (β i)] : Type max u v where mk' ::
toFun : ∀ i, β i
support' : Trunc { s : Multiset ι // ∀ i, i ∈ s ∨ toFun i = 0 }
#align dfinsupp DFinsupp
variable {β}
notation3 "Π₀ "(...)", "r:(scoped f => DFinsupp f) => r
namespace DFinsupp
section Basic
variable [∀ i, Zero (β i)] [∀ i, Zero (β₁ i)] [∀ i, Zero (β₂ i)]
instance instDFunLike : DFunLike (Π₀ i, β i) ι β :=
⟨fun f => f.toFun, fun ⟨f₁, s₁⟩ ⟨f₂, s₁⟩ ↦ fun (h : f₁ = f₂) ↦ by
subst h
congr
apply Subsingleton.elim ⟩
#align dfinsupp.fun_like DFinsupp.instDFunLike
instance : CoeFun (Π₀ i, β i) fun _ => ∀ i, β i :=
inferInstance
@[simp]
theorem toFun_eq_coe (f : Π₀ i, β i) : f.toFun = f :=
rfl
#align dfinsupp.to_fun_eq_coe DFinsupp.toFun_eq_coe
@[ext]
theorem ext {f g : Π₀ i, β i} (h : ∀ i, f i = g i) : f = g :=
DFunLike.ext _ _ h
#align dfinsupp.ext DFinsupp.ext
#align dfinsupp.ext_iff DFunLike.ext_iff
#align dfinsupp.coe_fn_injective DFunLike.coe_injective
lemma ne_iff {f g : Π₀ i, β i} : f ≠ g ↔ ∃ i, f i ≠ g i := DFunLike.ne_iff
instance : Zero (Π₀ i, β i) :=
⟨⟨0, Trunc.mk <| ⟨∅, fun _ => Or.inr rfl⟩⟩⟩
instance : Inhabited (Π₀ i, β i) :=
⟨0⟩
@[simp, norm_cast] lemma coe_mk' (f : ∀ i, β i) (s) : ⇑(⟨f, s⟩ : Π₀ i, β i) = f := rfl
#align dfinsupp.coe_mk' DFinsupp.coe_mk'
@[simp, norm_cast] lemma coe_zero : ⇑(0 : Π₀ i, β i) = 0 := rfl
#align dfinsupp.coe_zero DFinsupp.coe_zero
theorem zero_apply (i : ι) : (0 : Π₀ i, β i) i = 0 :=
rfl
#align dfinsupp.zero_apply DFinsupp.zero_apply
def mapRange (f : ∀ i, β₁ i → β₂ i) (hf : ∀ i, f i 0 = 0) (x : Π₀ i, β₁ i) : Π₀ i, β₂ i :=
⟨fun i => f i (x i),
x.support'.map fun s => ⟨s.1, fun i => (s.2 i).imp_right fun h : x i = 0 => by
rw [← hf i, ← h]⟩⟩
#align dfinsupp.map_range DFinsupp.mapRange
@[simp]
theorem mapRange_apply (f : ∀ i, β₁ i → β₂ i) (hf : ∀ i, f i 0 = 0) (g : Π₀ i, β₁ i) (i : ι) :
mapRange f hf g i = f i (g i) :=
rfl
#align dfinsupp.map_range_apply DFinsupp.mapRange_apply
@[simp]
theorem mapRange_id (h : ∀ i, id (0 : β₁ i) = 0 := fun i => rfl) (g : Π₀ i : ι, β₁ i) :
mapRange (fun i => (id : β₁ i → β₁ i)) h g = g := by
ext
rfl
#align dfinsupp.map_range_id DFinsupp.mapRange_id
theorem mapRange_comp (f : ∀ i, β₁ i → β₂ i) (f₂ : ∀ i, β i → β₁ i) (hf : ∀ i, f i 0 = 0)
(hf₂ : ∀ i, f₂ i 0 = 0) (h : ∀ i, (f i ∘ f₂ i) 0 = 0) (g : Π₀ i : ι, β i) :
mapRange (fun i => f i ∘ f₂ i) h g = mapRange f hf (mapRange f₂ hf₂ g) := by
ext
simp only [mapRange_apply]; rfl
#align dfinsupp.map_range_comp DFinsupp.mapRange_comp
@[simp]
theorem mapRange_zero (f : ∀ i, β₁ i → β₂ i) (hf : ∀ i, f i 0 = 0) :
mapRange f hf (0 : Π₀ i, β₁ i) = 0 := by
ext
simp only [mapRange_apply, coe_zero, Pi.zero_apply, hf]
#align dfinsupp.map_range_zero DFinsupp.mapRange_zero
def zipWith (f : ∀ i, β₁ i → β₂ i → β i) (hf : ∀ i, f i 0 0 = 0) (x : Π₀ i, β₁ i) (y : Π₀ i, β₂ i) :
Π₀ i, β i :=
⟨fun i => f i (x i) (y i), by
refine x.support'.bind fun xs => ?_
refine y.support'.map fun ys => ?_
refine ⟨xs + ys, fun i => ?_⟩
obtain h1 | (h1 : x i = 0) := xs.prop i
· left
rw [Multiset.mem_add]
left
exact h1
obtain h2 | (h2 : y i = 0) := ys.prop i
· left
rw [Multiset.mem_add]
right
exact h2
right; rw [← hf, ← h1, ← h2]⟩
#align dfinsupp.zip_with DFinsupp.zipWith
@[simp]
theorem zipWith_apply (f : ∀ i, β₁ i → β₂ i → β i) (hf : ∀ i, f i 0 0 = 0) (g₁ : Π₀ i, β₁ i)
(g₂ : Π₀ i, β₂ i) (i : ι) : zipWith f hf g₁ g₂ i = f i (g₁ i) (g₂ i) :=
rfl
#align dfinsupp.zip_with_apply DFinsupp.zipWith_apply
variable [DecidableEq ι]
section Basic
variable [∀ i, Zero (β i)]
theorem finite_support (f : Π₀ i, β i) : Set.Finite { i | f i ≠ 0 } :=
Trunc.induction_on f.support' fun xs ↦
xs.1.finite_toSet.subset fun i H ↦ ((xs.prop i).resolve_right H)
#align dfinsupp.finite_support DFinsupp.finite_support
def mk (s : Finset ι) (x : ∀ i : (↑s : Set ι), β (i : ι)) : Π₀ i, β i :=
⟨fun i => if H : i ∈ s then x ⟨i, H⟩ else 0,
Trunc.mk ⟨s.1, fun i => if H : i ∈ s then Or.inl H else Or.inr <| dif_neg H⟩⟩
#align dfinsupp.mk DFinsupp.mk
variable {s : Finset ι} {x : ∀ i : (↑s : Set ι), β i} {i : ι}
@[simp]
theorem mk_apply : (mk s x : ∀ i, β i) i = if H : i ∈ s then x ⟨i, H⟩ else 0 :=
rfl
#align dfinsupp.mk_apply DFinsupp.mk_apply
theorem mk_of_mem (hi : i ∈ s) : (mk s x : ∀ i, β i) i = x ⟨i, hi⟩ :=
dif_pos hi
#align dfinsupp.mk_of_mem DFinsupp.mk_of_mem
theorem mk_of_not_mem (hi : i ∉ s) : (mk s x : ∀ i, β i) i = 0 :=
dif_neg hi
#align dfinsupp.mk_of_not_mem DFinsupp.mk_of_not_mem
theorem mk_injective (s : Finset ι) : Function.Injective (@mk ι β _ _ s) := by
intro x y H
ext i
have h1 : (mk s x : ∀ i, β i) i = (mk s y : ∀ i, β i) i := by rw [H]
obtain ⟨i, hi : i ∈ s⟩ := i
dsimp only [mk_apply, Subtype.coe_mk] at h1
simpa only [dif_pos hi] using h1
#align dfinsupp.mk_injective DFinsupp.mk_injective
instance unique [∀ i, Subsingleton (β i)] : Unique (Π₀ i, β i) :=
DFunLike.coe_injective.unique
#align dfinsupp.unique DFinsupp.unique
instance uniqueOfIsEmpty [IsEmpty ι] : Unique (Π₀ i, β i) :=
DFunLike.coe_injective.unique
#align dfinsupp.unique_of_is_empty DFinsupp.uniqueOfIsEmpty
@[simps apply]
def equivFunOnFintype [Fintype ι] : (Π₀ i, β i) ≃ ∀ i, β i where
toFun := (⇑)
invFun f := ⟨f, Trunc.mk ⟨Finset.univ.1, fun _ => Or.inl <| Finset.mem_univ_val _⟩⟩
left_inv _ := DFunLike.coe_injective rfl
right_inv _ := rfl
#align dfinsupp.equiv_fun_on_fintype DFinsupp.equivFunOnFintype
#align dfinsupp.equiv_fun_on_fintype_apply DFinsupp.equivFunOnFintype_apply
@[simp]
theorem equivFunOnFintype_symm_coe [Fintype ι] (f : Π₀ i, β i) : equivFunOnFintype.symm f = f :=
Equiv.symm_apply_apply _ _
#align dfinsupp.equiv_fun_on_fintype_symm_coe DFinsupp.equivFunOnFintype_symm_coe
def single (i : ι) (b : β i) : Π₀ i, β i :=
⟨Pi.single i b,
Trunc.mk ⟨{i}, fun j => (Decidable.eq_or_ne j i).imp (by simp) fun h => Pi.single_eq_of_ne h _⟩⟩
#align dfinsupp.single DFinsupp.single
theorem single_eq_pi_single {i b} : ⇑(single i b : Π₀ i, β i) = Pi.single i b :=
rfl
#align dfinsupp.single_eq_pi_single DFinsupp.single_eq_pi_single
@[simp]
theorem single_apply {i i' b} :
(single i b : Π₀ i, β i) i' = if h : i = i' then Eq.recOn h b else 0 := by
rw [single_eq_pi_single, Pi.single, Function.update]
simp [@eq_comm _ i i']
#align dfinsupp.single_apply DFinsupp.single_apply
@[simp]
theorem single_zero (i) : (single i 0 : Π₀ i, β i) = 0 :=
DFunLike.coe_injective <| Pi.single_zero _
#align dfinsupp.single_zero DFinsupp.single_zero
-- @[simp] -- Porting note (#10618): simp can prove this
| Mathlib/Data/DFinsupp/Basic.lean | 635 | 636 | theorem single_eq_same {i b} : (single i b : Π₀ i, β i) i = b := by |
simp only [single_apply, dite_eq_ite, ite_true]
|
import Mathlib.LinearAlgebra.Matrix.DotProduct
import Mathlib.LinearAlgebra.Determinant
import Mathlib.LinearAlgebra.Matrix.Diagonal
#align_import data.matrix.rank from "leanprover-community/mathlib"@"17219820a8aa8abe85adf5dfde19af1dd1bd8ae7"
open Matrix
namespace Matrix
open FiniteDimensional
variable {l m n o R : Type*} [Fintype n] [Fintype o]
section CommRing
variable [CommRing R]
noncomputable def rank (A : Matrix m n R) : ℕ :=
finrank R <| LinearMap.range A.mulVecLin
#align matrix.rank Matrix.rank
@[simp]
theorem rank_one [StrongRankCondition R] [DecidableEq n] :
rank (1 : Matrix n n R) = Fintype.card n := by
rw [rank, mulVecLin_one, LinearMap.range_id, finrank_top, finrank_pi]
#align matrix.rank_one Matrix.rank_one
@[simp]
theorem rank_zero [Nontrivial R] : rank (0 : Matrix m n R) = 0 := by
rw [rank, mulVecLin_zero, LinearMap.range_zero, finrank_bot]
#align matrix.rank_zero Matrix.rank_zero
theorem rank_le_card_width [StrongRankCondition R] (A : Matrix m n R) :
A.rank ≤ Fintype.card n := by
haveI : Module.Finite R (n → R) := Module.Finite.pi
haveI : Module.Free R (n → R) := Module.Free.pi _ _
exact A.mulVecLin.finrank_range_le.trans_eq (finrank_pi _)
#align matrix.rank_le_card_width Matrix.rank_le_card_width
theorem rank_le_width [StrongRankCondition R] {m n : ℕ} (A : Matrix (Fin m) (Fin n) R) :
A.rank ≤ n :=
A.rank_le_card_width.trans <| (Fintype.card_fin n).le
#align matrix.rank_le_width Matrix.rank_le_width
theorem rank_mul_le_left [StrongRankCondition R] (A : Matrix m n R) (B : Matrix n o R) :
(A * B).rank ≤ A.rank := by
rw [rank, rank, mulVecLin_mul]
exact Cardinal.toNat_le_toNat (LinearMap.rank_comp_le_left _ _) (rank_lt_aleph0 _ _)
#align matrix.rank_mul_le_left Matrix.rank_mul_le_left
theorem rank_mul_le_right [StrongRankCondition R] (A : Matrix m n R) (B : Matrix n o R) :
(A * B).rank ≤ B.rank := by
rw [rank, rank, mulVecLin_mul]
exact finrank_le_finrank_of_rank_le_rank (LinearMap.lift_rank_comp_le_right _ _)
(rank_lt_aleph0 _ _)
#align matrix.rank_mul_le_right Matrix.rank_mul_le_right
theorem rank_mul_le [StrongRankCondition R] (A : Matrix m n R) (B : Matrix n o R) :
(A * B).rank ≤ min A.rank B.rank :=
le_min (rank_mul_le_left _ _) (rank_mul_le_right _ _)
#align matrix.rank_mul_le Matrix.rank_mul_le
theorem rank_unit [StrongRankCondition R] [DecidableEq n] (A : (Matrix n n R)ˣ) :
(A : Matrix n n R).rank = Fintype.card n := by
apply le_antisymm (rank_le_card_width (A : Matrix n n R)) _
have := rank_mul_le_left (A : Matrix n n R) (↑A⁻¹ : Matrix n n R)
rwa [← Units.val_mul, mul_inv_self, Units.val_one, rank_one] at this
#align matrix.rank_unit Matrix.rank_unit
theorem rank_of_isUnit [StrongRankCondition R] [DecidableEq n] (A : Matrix n n R) (h : IsUnit A) :
A.rank = Fintype.card n := by
obtain ⟨A, rfl⟩ := h
exact rank_unit A
#align matrix.rank_of_is_unit Matrix.rank_of_isUnit
@[simp]
lemma rank_mul_eq_left_of_isUnit_det [DecidableEq n]
(A : Matrix n n R) (B : Matrix m n R) (hA : IsUnit A.det) :
(B * A).rank = B.rank := by
suffices Function.Surjective A.mulVecLin by
rw [rank, mulVecLin_mul, LinearMap.range_comp_of_range_eq_top _
(LinearMap.range_eq_top.mpr this), ← rank]
intro v
exact ⟨(A⁻¹).mulVecLin v, by simp [mul_nonsing_inv _ hA]⟩
@[simp]
lemma rank_mul_eq_right_of_isUnit_det [Fintype m] [DecidableEq m]
(A : Matrix m m R) (B : Matrix m n R) (hA : IsUnit A.det) :
(A * B).rank = B.rank := by
let b : Basis m R (m → R) := Pi.basisFun R m
replace hA : IsUnit (LinearMap.toMatrix b b A.mulVecLin).det := by
convert hA; rw [← LinearEquiv.eq_symm_apply]; rfl
have hAB : mulVecLin (A * B) = (LinearEquiv.ofIsUnitDet hA).comp (mulVecLin B) := by ext; simp
rw [rank, rank, hAB, LinearMap.range_comp, LinearEquiv.finrank_map_eq]
theorem rank_submatrix_le [StrongRankCondition R] [Fintype m] (f : n → m) (e : n ≃ m)
(A : Matrix m m R) : rank (A.submatrix f e) ≤ rank A := by
rw [rank, rank, mulVecLin_submatrix, LinearMap.range_comp, LinearMap.range_comp,
show LinearMap.funLeft R R e.symm = LinearEquiv.funCongrLeft R R e.symm from rfl,
LinearEquiv.range, Submodule.map_top]
exact Submodule.finrank_map_le _ _
#align matrix.rank_submatrix_le Matrix.rank_submatrix_le
theorem rank_reindex [Fintype m] (e₁ e₂ : m ≃ n) (A : Matrix m m R) :
rank (reindex e₁ e₂ A) = rank A := by
rw [rank, rank, mulVecLin_reindex, LinearMap.range_comp, LinearMap.range_comp,
LinearEquiv.range, Submodule.map_top, LinearEquiv.finrank_map_eq]
#align matrix.rank_reindex Matrix.rank_reindex
@[simp]
| Mathlib/Data/Matrix/Rank.lean | 140 | 142 | theorem rank_submatrix [Fintype m] (A : Matrix m m R) (e₁ e₂ : n ≃ m) :
rank (A.submatrix e₁ e₂) = rank A := by |
simpa only [reindex_apply] using rank_reindex e₁.symm e₂.symm A
|
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 _
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 _)
theorem Sublist.reverse : l₁ <+ l₂ → l₁.reverse <+ l₂.reverse
| .slnil => Sublist.refl _
| .cons _ h => by rw [reverse_cons]; exact sublist_append_of_sublist_left h.reverse
| .cons₂ _ h => by rw [reverse_cons, reverse_cons]; exact h.reverse.append_right _
@[simp] theorem reverse_sublist : l₁.reverse <+ l₂.reverse ↔ l₁ <+ l₂ :=
⟨fun h => l₁.reverse_reverse ▸ l₂.reverse_reverse ▸ h.reverse, Sublist.reverse⟩
@[simp] theorem append_sublist_append_right (l) : l₁ ++ l <+ l₂ ++ l ↔ l₁ <+ l₂ :=
⟨fun h => by
have := h.reverse
simp only [reverse_append, append_sublist_append_left, reverse_sublist] at this
exact this,
fun h => h.append_right l⟩
theorem Sublist.append (hl : l₁ <+ l₂) (hr : r₁ <+ r₂) : l₁ ++ r₁ <+ l₂ ++ r₂ :=
(hl.append_right _).trans ((append_sublist_append_left _).2 hr)
theorem Sublist.subset : l₁ <+ l₂ → l₁ ⊆ l₂
| .slnil, _, h => h
| .cons _ s, _, h => .tail _ (s.subset h)
| .cons₂ .., _, .head .. => .head ..
| .cons₂ _ s, _, .tail _ h => .tail _ (s.subset h)
instance : Trans (@Sublist α) Subset Subset :=
⟨fun h₁ h₂ => trans h₁.subset h₂⟩
instance : Trans Subset (@Sublist α) Subset :=
⟨fun h₁ h₂ => trans h₁ h₂.subset⟩
instance : Trans (Membership.mem : α → List α → Prop) Sublist Membership.mem :=
⟨fun h₁ h₂ => h₂.subset h₁⟩
theorem Sublist.length_le : l₁ <+ l₂ → length l₁ ≤ length l₂
| .slnil => Nat.le_refl 0
| .cons _l s => le_succ_of_le (length_le s)
| .cons₂ _ s => succ_le_succ (length_le s)
@[simp] theorem sublist_nil {l : List α} : l <+ [] ↔ l = [] :=
⟨fun s => subset_nil.1 s.subset, fun H => H ▸ Sublist.refl _⟩
theorem Sublist.eq_of_length : l₁ <+ l₂ → length l₁ = length l₂ → l₁ = l₂
| .slnil, _ => rfl
| .cons a s, h => nomatch Nat.not_lt.2 s.length_le (h ▸ lt_succ_self _)
| .cons₂ a s, h => by rw [s.eq_of_length (succ.inj h)]
theorem Sublist.eq_of_length_le (s : l₁ <+ l₂) (h : length l₂ ≤ length l₁) : l₁ = l₂ :=
s.eq_of_length <| Nat.le_antisymm s.length_le h
@[simp] theorem singleton_sublist {a : α} {l} : [a] <+ l ↔ a ∈ l := by
refine ⟨fun h => h.subset (mem_singleton_self _), fun h => ?_⟩
obtain ⟨_, _, rfl⟩ := append_of_mem h
exact ((nil_sublist _).cons₂ _).trans (sublist_append_right ..)
@[simp] theorem replicate_sublist_replicate {m n} (a : α) :
replicate m a <+ replicate n a ↔ m ≤ n := by
refine ⟨fun h => ?_, fun h => ?_⟩
· have := h.length_le; simp only [length_replicate] at this ⊢; exact this
· induction h with
| refl => apply Sublist.refl
| step => simp [*, replicate, Sublist.cons]
theorem isSublist_iff_sublist [BEq α] [LawfulBEq α] {l₁ l₂ : List α} :
l₁.isSublist l₂ ↔ l₁ <+ l₂ := by
cases l₁ <;> cases l₂ <;> simp [isSublist]
case cons.cons hd₁ tl₁ hd₂ tl₂ =>
if h_eq : hd₁ = hd₂ then
simp [h_eq, cons_sublist_cons, isSublist_iff_sublist]
else
simp only [beq_iff_eq, h_eq]
constructor
· intro h_sub
apply Sublist.cons
exact isSublist_iff_sublist.mp h_sub
· intro h_sub
cases h_sub
case cons h_sub =>
exact isSublist_iff_sublist.mpr h_sub
case cons₂ =>
contradiction
instance [DecidableEq α] (l₁ l₂ : List α) : Decidable (l₁ <+ l₂) :=
decidable_of_iff (l₁.isSublist l₂) isSublist_iff_sublist
theorem tail_eq_tailD (l) : @tail α l = tailD l [] := by cases l <;> rfl
theorem tail_eq_tail? (l) : @tail α l = (tail? l).getD [] := by simp [tail_eq_tailD]
@[simp] theorem next?_nil : @next? α [] = none := rfl
@[simp] theorem next?_cons (a l) : @next? α (a :: l) = some (a, l) := rfl
theorem get_eq_iff : List.get l n = x ↔ l.get? n.1 = some x := by simp [get?_eq_some]
theorem get?_inj
(h₀ : i < xs.length) (h₁ : Nodup xs) (h₂ : xs.get? i = xs.get? j) : i = j := by
induction xs generalizing i j with
| nil => cases h₀
| cons x xs ih =>
match i, j with
| 0, 0 => rfl
| i+1, j+1 => simp; cases h₁ with
| cons ha h₁ => exact ih (Nat.lt_of_succ_lt_succ h₀) h₁ h₂
| i+1, 0 => ?_ | 0, j+1 => ?_
all_goals
simp at h₂
cases h₁; rename_i h' h
have := h x ?_ rfl; cases this
rw [mem_iff_get?]
exact ⟨_, h₂⟩; exact ⟨_ , h₂.symm⟩
theorem tail_drop (l : List α) (n : Nat) : (l.drop n).tail = l.drop (n + 1) := by
induction l generalizing n with
| nil => simp
| cons hd tl hl =>
cases n
· simp
· simp [hl]
@[simp] theorem modifyNth_nil (f : α → α) (n) : [].modifyNth f n = [] := by cases n <;> rfl
@[simp] theorem modifyNth_zero_cons (f : α → α) (a : α) (l : List α) :
(a :: l).modifyNth f 0 = f a :: l := rfl
@[simp] theorem modifyNth_succ_cons (f : α → α) (a : α) (l : List α) (n) :
(a :: l).modifyNth f (n + 1) = a :: l.modifyNth f n := by rfl
theorem modifyNthTail_id : ∀ n (l : List α), l.modifyNthTail id n = l
| 0, _ => rfl
| _+1, [] => rfl
| n+1, a :: l => congrArg (cons a) (modifyNthTail_id n l)
theorem eraseIdx_eq_modifyNthTail : ∀ n (l : List α), eraseIdx l n = modifyNthTail tail n l
| 0, l => by cases l <;> rfl
| n+1, [] => rfl
| n+1, a :: l => congrArg (cons _) (eraseIdx_eq_modifyNthTail _ _)
@[deprecated] alias removeNth_eq_nth_tail := eraseIdx_eq_modifyNthTail
theorem get?_modifyNth (f : α → α) :
∀ n (l : List α) m, (modifyNth f n l).get? m = (fun a => if n = m then f a else a) <$> l.get? m
| n, l, 0 => by cases l <;> cases n <;> rfl
| n, [], _+1 => by cases n <;> rfl
| 0, _ :: l, m+1 => by cases h : l.get? m <;> simp [h, modifyNth, m.succ_ne_zero.symm]
| n+1, a :: l, m+1 =>
(get?_modifyNth f n l m).trans <| by
cases h' : l.get? m <;> by_cases h : n = m <;>
simp [h, if_pos, if_neg, Option.map, mt Nat.succ.inj, not_false_iff, h']
theorem modifyNthTail_length (f : List α → List α) (H : ∀ l, length (f l) = length l) :
∀ n l, length (modifyNthTail f n l) = length l
| 0, _ => H _
| _+1, [] => rfl
| _+1, _ :: _ => congrArg (·+1) (modifyNthTail_length _ H _ _)
theorem modifyNthTail_add (f : List α → List α) (n) (l₁ l₂ : List α) :
modifyNthTail f (l₁.length + n) (l₁ ++ l₂) = l₁ ++ modifyNthTail f n l₂ := by
induction l₁ <;> simp [*, Nat.succ_add]
theorem exists_of_modifyNthTail (f : List α → List α) {n} {l : List α} (h : n ≤ l.length) :
∃ l₁ l₂, l = l₁ ++ l₂ ∧ l₁.length = n ∧ modifyNthTail f n l = l₁ ++ f l₂ :=
have ⟨_, _, eq, hl⟩ : ∃ l₁ l₂, l = l₁ ++ l₂ ∧ l₁.length = n :=
⟨_, _, (take_append_drop n l).symm, length_take_of_le h⟩
⟨_, _, eq, hl, hl ▸ eq ▸ modifyNthTail_add (n := 0) ..⟩
@[simp] theorem modify_get?_length (f : α → α) : ∀ n l, length (modifyNth f n l) = length l :=
modifyNthTail_length _ fun l => by cases l <;> rfl
@[simp] theorem get?_modifyNth_eq (f : α → α) (n) (l : List α) :
(modifyNth f n l).get? n = f <$> l.get? n := by
simp only [get?_modifyNth, if_pos]
@[simp] theorem get?_modifyNth_ne (f : α → α) {m n} (l : List α) (h : m ≠ n) :
(modifyNth f m l).get? n = l.get? n := by
simp only [get?_modifyNth, if_neg h, id_map']
theorem exists_of_modifyNth (f : α → α) {n} {l : List α} (h : n < l.length) :
∃ l₁ a l₂, l = l₁ ++ a :: l₂ ∧ l₁.length = n ∧ modifyNth f n l = l₁ ++ f a :: l₂ :=
match exists_of_modifyNthTail _ (Nat.le_of_lt h) with
| ⟨_, _::_, eq, hl, H⟩ => ⟨_, _, _, eq, hl, H⟩
| ⟨_, [], eq, hl, _⟩ => nomatch Nat.ne_of_gt h (eq ▸ append_nil _ ▸ hl)
theorem modifyNthTail_eq_take_drop (f : List α → List α) (H : f [] = []) :
∀ n l, modifyNthTail f n l = take n l ++ f (drop n l)
| 0, _ => rfl
| _ + 1, [] => H.symm
| n + 1, b :: l => congrArg (cons b) (modifyNthTail_eq_take_drop f H n l)
theorem modifyNth_eq_take_drop (f : α → α) :
∀ n l, modifyNth f n l = take n l ++ modifyHead f (drop n l) :=
modifyNthTail_eq_take_drop _ rfl
theorem modifyNth_eq_take_cons_drop (f : α → α) {n l} (h) :
modifyNth f n l = take n l ++ f (get l ⟨n, h⟩) :: drop (n + 1) l := by
rw [modifyNth_eq_take_drop, drop_eq_get_cons h]; rfl
theorem set_eq_modifyNth (a : α) : ∀ n (l : List α), set l n a = modifyNth (fun _ => a) n l
| 0, l => by cases l <;> rfl
| n+1, [] => rfl
| n+1, b :: l => congrArg (cons _) (set_eq_modifyNth _ _ _)
theorem set_eq_take_cons_drop (a : α) {n l} (h : n < length l) :
set l n a = take n l ++ a :: drop (n + 1) l := by
rw [set_eq_modifyNth, modifyNth_eq_take_cons_drop _ h]
theorem modifyNth_eq_set_get? (f : α → α) :
∀ n (l : List α), l.modifyNth f n = ((fun a => l.set n (f a)) <$> l.get? n).getD l
| 0, l => by cases l <;> rfl
| n+1, [] => rfl
| n+1, b :: l =>
(congrArg (cons _) (modifyNth_eq_set_get? ..)).trans <| by cases h : l.get? n <;> simp [h]
theorem modifyNth_eq_set_get (f : α → α) {n} {l : List α} (h) :
l.modifyNth f n = l.set n (f (l.get ⟨n, h⟩)) := by
rw [modifyNth_eq_set_get?, get?_eq_get h]; rfl
theorem exists_of_set {l : List α} (h : n < l.length) :
∃ l₁ a l₂, l = l₁ ++ a :: l₂ ∧ l₁.length = n ∧ l.set n a' = l₁ ++ a' :: l₂ := by
rw [set_eq_modifyNth]; exact exists_of_modifyNth _ h
theorem exists_of_set' {l : List α} (h : n < l.length) :
∃ l₁ l₂, l = l₁ ++ l.get ⟨n, h⟩ :: l₂ ∧ l₁.length = n ∧ l.set n a' = l₁ ++ a' :: l₂ :=
have ⟨_, _, _, h₁, h₂, h₃⟩ := exists_of_set h; ⟨_, _, get_of_append h₁ h₂ ▸ h₁, h₂, h₃⟩
@[simp]
theorem get?_set_eq (a : α) (n) (l : List α) : (set l n a).get? n = (fun _ => a) <$> l.get? n := by
simp only [set_eq_modifyNth, get?_modifyNth_eq]
theorem get?_set_eq_of_lt (a : α) {n} {l : List α} (h : n < length l) :
(set l n a).get? n = some a := by rw [get?_set_eq, get?_eq_get h]; rfl
@[simp]
theorem get?_set_ne (a : α) {m n} (l : List α) (h : m ≠ n) : (set l m a).get? n = l.get? n := by
simp only [set_eq_modifyNth, get?_modifyNth_ne _ _ h]
| .lake/packages/batteries/Batteries/Data/List/Lemmas.lean | 395 | 397 | theorem get?_set (a : α) {m n} (l : List α) :
(set l m a).get? n = if m = n then (fun _ => a) <$> l.get? n else l.get? n := by |
by_cases m = n <;> simp [*, get?_set_eq, get?_set_ne]
|
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]
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]
#align orientation.two_zsmul_oangle_smul_smul_self Orientation.two_zsmul_oangle_smul_smul_self
theorem two_zsmul_oangle_left_of_span_eq {x y : V} (z : V) (h : (ℝ ∙ x) = ℝ ∙ y) :
(2 : ℤ) • o.oangle x z = (2 : ℤ) • o.oangle y z := by
rw [Submodule.span_singleton_eq_span_singleton] at h
rcases h with ⟨r, rfl⟩
exact (o.two_zsmul_oangle_smul_left_of_ne_zero _ _ (Units.ne_zero _)).symm
#align orientation.two_zsmul_oangle_left_of_span_eq Orientation.two_zsmul_oangle_left_of_span_eq
theorem two_zsmul_oangle_right_of_span_eq (x : V) {y z : V} (h : (ℝ ∙ y) = ℝ ∙ z) :
(2 : ℤ) • o.oangle x y = (2 : ℤ) • o.oangle x z := by
rw [Submodule.span_singleton_eq_span_singleton] at h
rcases h with ⟨r, rfl⟩
exact (o.two_zsmul_oangle_smul_right_of_ne_zero _ _ (Units.ne_zero _)).symm
#align orientation.two_zsmul_oangle_right_of_span_eq Orientation.two_zsmul_oangle_right_of_span_eq
theorem two_zsmul_oangle_of_span_eq_of_span_eq {w x y z : V} (hwx : (ℝ ∙ w) = ℝ ∙ x)
(hyz : (ℝ ∙ y) = ℝ ∙ z) : (2 : ℤ) • o.oangle w y = (2 : ℤ) • o.oangle x z := by
rw [o.two_zsmul_oangle_left_of_span_eq y hwx, o.two_zsmul_oangle_right_of_span_eq x hyz]
#align orientation.two_zsmul_oangle_of_span_eq_of_span_eq Orientation.two_zsmul_oangle_of_span_eq_of_span_eq
theorem oangle_eq_zero_iff_oangle_rev_eq_zero {x y : V} : o.oangle x y = 0 ↔ o.oangle y x = 0 := by
rw [oangle_rev, neg_eq_zero]
#align orientation.oangle_eq_zero_iff_oangle_rev_eq_zero Orientation.oangle_eq_zero_iff_oangle_rev_eq_zero
theorem oangle_eq_zero_iff_sameRay {x y : V} : o.oangle x y = 0 ↔ SameRay ℝ x y := by
rw [oangle, kahler_apply_apply, Complex.arg_coe_angle_eq_iff_eq_toReal, Real.Angle.toReal_zero,
Complex.arg_eq_zero_iff]
simpa using o.nonneg_inner_and_areaForm_eq_zero_iff_sameRay x y
#align orientation.oangle_eq_zero_iff_same_ray Orientation.oangle_eq_zero_iff_sameRay
theorem oangle_eq_pi_iff_oangle_rev_eq_pi {x y : V} : o.oangle x y = π ↔ o.oangle y x = π := by
rw [oangle_rev, neg_eq_iff_eq_neg, Real.Angle.neg_coe_pi]
#align orientation.oangle_eq_pi_iff_oangle_rev_eq_pi Orientation.oangle_eq_pi_iff_oangle_rev_eq_pi
theorem oangle_eq_pi_iff_sameRay_neg {x y : V} :
o.oangle x y = π ↔ x ≠ 0 ∧ y ≠ 0 ∧ SameRay ℝ x (-y) := by
rw [← o.oangle_eq_zero_iff_sameRay]
constructor
· intro h
by_cases hx : x = 0; · simp [hx, Real.Angle.pi_ne_zero.symm] at h
by_cases hy : y = 0; · simp [hy, Real.Angle.pi_ne_zero.symm] at h
refine ⟨hx, hy, ?_⟩
rw [o.oangle_neg_right hx hy, h, Real.Angle.coe_pi_add_coe_pi]
· rintro ⟨hx, hy, h⟩
rwa [o.oangle_neg_right hx hy, ← Real.Angle.sub_coe_pi_eq_add_coe_pi, sub_eq_zero] at h
#align orientation.oangle_eq_pi_iff_same_ray_neg Orientation.oangle_eq_pi_iff_sameRay_neg
theorem oangle_eq_zero_or_eq_pi_iff_not_linearIndependent {x y : V} :
o.oangle x y = 0 ∨ o.oangle x y = π ↔ ¬LinearIndependent ℝ ![x, y] := by
rw [oangle_eq_zero_iff_sameRay, oangle_eq_pi_iff_sameRay_neg,
sameRay_or_ne_zero_and_sameRay_neg_iff_not_linearIndependent]
#align orientation.oangle_eq_zero_or_eq_pi_iff_not_linear_independent Orientation.oangle_eq_zero_or_eq_pi_iff_not_linearIndependent
theorem oangle_eq_zero_or_eq_pi_iff_right_eq_smul {x y : V} :
o.oangle x y = 0 ∨ o.oangle x y = π ↔ x = 0 ∨ ∃ r : ℝ, y = r • x := by
rw [oangle_eq_zero_iff_sameRay, oangle_eq_pi_iff_sameRay_neg]
refine ⟨fun h => ?_, fun h => ?_⟩
· rcases h with (h | ⟨-, -, h⟩)
· by_cases hx : x = 0; · simp [hx]
obtain ⟨r, -, rfl⟩ := h.exists_nonneg_left hx
exact Or.inr ⟨r, rfl⟩
· by_cases hx : x = 0; · simp [hx]
obtain ⟨r, -, hy⟩ := h.exists_nonneg_left hx
refine Or.inr ⟨-r, ?_⟩
simp [hy]
· rcases h with (rfl | ⟨r, rfl⟩); · simp
by_cases hx : x = 0; · simp [hx]
rcases lt_trichotomy r 0 with (hr | hr | hr)
· rw [← neg_smul]
exact Or.inr ⟨hx, smul_ne_zero hr.ne hx,
SameRay.sameRay_pos_smul_right x (Left.neg_pos_iff.2 hr)⟩
· simp [hr]
· exact Or.inl (SameRay.sameRay_pos_smul_right x hr)
#align orientation.oangle_eq_zero_or_eq_pi_iff_right_eq_smul Orientation.oangle_eq_zero_or_eq_pi_iff_right_eq_smul
theorem oangle_ne_zero_and_ne_pi_iff_linearIndependent {x y : V} :
o.oangle x y ≠ 0 ∧ o.oangle x y ≠ π ↔ LinearIndependent ℝ ![x, y] := by
rw [← not_or, ← not_iff_not, Classical.not_not,
oangle_eq_zero_or_eq_pi_iff_not_linearIndependent]
#align orientation.oangle_ne_zero_and_ne_pi_iff_linear_independent Orientation.oangle_ne_zero_and_ne_pi_iff_linearIndependent
theorem eq_iff_norm_eq_and_oangle_eq_zero (x y : V) : x = y ↔ ‖x‖ = ‖y‖ ∧ o.oangle x y = 0 := by
rw [oangle_eq_zero_iff_sameRay]
constructor
· rintro rfl
simp; rfl
· rcases eq_or_ne y 0 with (rfl | hy)
· simp
rintro ⟨h₁, h₂⟩
obtain ⟨r, hr, rfl⟩ := h₂.exists_nonneg_right hy
have : ‖y‖ ≠ 0 := by simpa using hy
obtain rfl : r = 1 := by
apply mul_right_cancel₀ this
simpa [norm_smul, _root_.abs_of_nonneg hr] using h₁
simp
#align orientation.eq_iff_norm_eq_and_oangle_eq_zero Orientation.eq_iff_norm_eq_and_oangle_eq_zero
theorem eq_iff_oangle_eq_zero_of_norm_eq {x y : V} (h : ‖x‖ = ‖y‖) : x = y ↔ o.oangle x y = 0 :=
⟨fun he => ((o.eq_iff_norm_eq_and_oangle_eq_zero x y).1 he).2, fun ha =>
(o.eq_iff_norm_eq_and_oangle_eq_zero x y).2 ⟨h, ha⟩⟩
#align orientation.eq_iff_oangle_eq_zero_of_norm_eq Orientation.eq_iff_oangle_eq_zero_of_norm_eq
theorem eq_iff_norm_eq_of_oangle_eq_zero {x y : V} (h : o.oangle x y = 0) : x = y ↔ ‖x‖ = ‖y‖ :=
⟨fun he => ((o.eq_iff_norm_eq_and_oangle_eq_zero x y).1 he).1, fun hn =>
(o.eq_iff_norm_eq_and_oangle_eq_zero x y).2 ⟨hn, h⟩⟩
#align orientation.eq_iff_norm_eq_of_oangle_eq_zero Orientation.eq_iff_norm_eq_of_oangle_eq_zero
@[simp]
theorem oangle_add {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) :
o.oangle x y + o.oangle y z = o.oangle x z := by
simp_rw [oangle]
rw [← Complex.arg_mul_coe_angle, o.kahler_mul y x z]
· congr 1
convert Complex.arg_real_mul _ (_ : 0 < ‖y‖ ^ 2) using 2
· norm_cast
· have : 0 < ‖y‖ := by simpa using hy
positivity
· exact o.kahler_ne_zero hx hy
· exact o.kahler_ne_zero hy hz
#align orientation.oangle_add Orientation.oangle_add
@[simp]
theorem oangle_add_swap {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) :
o.oangle y z + o.oangle x y = o.oangle x z := by rw [add_comm, o.oangle_add hx hy hz]
#align orientation.oangle_add_swap Orientation.oangle_add_swap
@[simp]
theorem oangle_sub_left {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) :
o.oangle x z - o.oangle x y = o.oangle y z := by
rw [sub_eq_iff_eq_add, o.oangle_add_swap hx hy hz]
#align orientation.oangle_sub_left Orientation.oangle_sub_left
@[simp]
theorem oangle_sub_right {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) :
o.oangle x z - o.oangle y z = o.oangle x y := by rw [sub_eq_iff_eq_add, o.oangle_add hx hy hz]
#align orientation.oangle_sub_right Orientation.oangle_sub_right
@[simp]
theorem oangle_add_cyc3 {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) :
o.oangle x y + o.oangle y z + o.oangle z x = 0 := by simp [hx, hy, hz]
#align orientation.oangle_add_cyc3 Orientation.oangle_add_cyc3
@[simp]
theorem oangle_add_cyc3_neg_left {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) :
o.oangle (-x) y + o.oangle (-y) z + o.oangle (-z) x = π := by
rw [o.oangle_neg_left hx hy, o.oangle_neg_left hy hz, o.oangle_neg_left hz hx,
show o.oangle x y + π + (o.oangle y z + π) + (o.oangle z x + π) =
o.oangle x y + o.oangle y z + o.oangle z x + (π + π + π : Real.Angle) by abel,
o.oangle_add_cyc3 hx hy hz, Real.Angle.coe_pi_add_coe_pi, zero_add, zero_add]
#align orientation.oangle_add_cyc3_neg_left Orientation.oangle_add_cyc3_neg_left
@[simp]
theorem oangle_add_cyc3_neg_right {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) :
o.oangle x (-y) + o.oangle y (-z) + o.oangle z (-x) = π := by
simp_rw [← oangle_neg_left_eq_neg_right, o.oangle_add_cyc3_neg_left hx hy hz]
#align orientation.oangle_add_cyc3_neg_right Orientation.oangle_add_cyc3_neg_right
theorem oangle_sub_eq_oangle_sub_rev_of_norm_eq {x y : V} (h : ‖x‖ = ‖y‖) :
o.oangle x (x - y) = o.oangle (y - x) y := by simp [oangle, h]
#align orientation.oangle_sub_eq_oangle_sub_rev_of_norm_eq Orientation.oangle_sub_eq_oangle_sub_rev_of_norm_eq
theorem oangle_eq_pi_sub_two_zsmul_oangle_sub_of_norm_eq {x y : V} (hn : x ≠ y) (h : ‖x‖ = ‖y‖) :
o.oangle y x = π - (2 : ℤ) • o.oangle (y - x) y := by
rw [two_zsmul]
nth_rw 1 [← o.oangle_sub_eq_oangle_sub_rev_of_norm_eq h]
rw [eq_sub_iff_add_eq, ← oangle_neg_neg, ← add_assoc]
have hy : y ≠ 0 := by
rintro rfl
rw [norm_zero, norm_eq_zero] at h
exact hn h
have hx : x ≠ 0 := norm_ne_zero_iff.1 (h.symm ▸ norm_ne_zero_iff.2 hy)
convert o.oangle_add_cyc3_neg_right (neg_ne_zero.2 hy) hx (sub_ne_zero_of_ne hn.symm) using 1
simp
#align orientation.oangle_eq_pi_sub_two_zsmul_oangle_sub_of_norm_eq Orientation.oangle_eq_pi_sub_two_zsmul_oangle_sub_of_norm_eq
@[simp]
theorem oangle_map (x y : V') (f : V ≃ₗᵢ[ℝ] V') :
(Orientation.map (Fin 2) f.toLinearEquiv o).oangle x y = o.oangle (f.symm x) (f.symm y) := by
simp [oangle, o.kahler_map]
#align orientation.oangle_map Orientation.oangle_map
@[simp]
protected theorem _root_.Complex.oangle (w z : ℂ) :
Complex.orientation.oangle w z = Complex.arg (conj w * z) := by simp [oangle]
#align complex.oangle Complex.oangle
theorem oangle_map_complex (f : V ≃ₗᵢ[ℝ] ℂ)
(hf : Orientation.map (Fin 2) f.toLinearEquiv o = Complex.orientation) (x y : V) :
o.oangle x y = Complex.arg (conj (f x) * f y) := by
rw [← Complex.oangle, ← hf, o.oangle_map]
iterate 2 rw [LinearIsometryEquiv.symm_apply_apply]
#align orientation.oangle_map_complex Orientation.oangle_map_complex
theorem oangle_neg_orientation_eq_neg (x y : V) : (-o).oangle x y = -o.oangle x y := by
simp [oangle]
#align orientation.oangle_neg_orientation_eq_neg Orientation.oangle_neg_orientation_eq_neg
theorem inner_eq_norm_mul_norm_mul_cos_oangle (x y : V) :
⟪x, y⟫ = ‖x‖ * ‖y‖ * Real.Angle.cos (o.oangle x y) := by
by_cases hx : x = 0; · simp [hx]
by_cases hy : y = 0; · simp [hy]
have : ‖x‖ ≠ 0 := by simpa using hx
have : ‖y‖ ≠ 0 := by simpa using hy
rw [oangle, Real.Angle.cos_coe, Complex.cos_arg, o.abs_kahler]
· simp only [kahler_apply_apply, real_smul, add_re, ofReal_re, mul_re, I_re, ofReal_im]
field_simp
· exact o.kahler_ne_zero hx hy
#align orientation.inner_eq_norm_mul_norm_mul_cos_oangle Orientation.inner_eq_norm_mul_norm_mul_cos_oangle
theorem cos_oangle_eq_inner_div_norm_mul_norm {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) :
Real.Angle.cos (o.oangle x y) = ⟪x, y⟫ / (‖x‖ * ‖y‖) := by
rw [o.inner_eq_norm_mul_norm_mul_cos_oangle]
field_simp [norm_ne_zero_iff.2 hx, norm_ne_zero_iff.2 hy]
#align orientation.cos_oangle_eq_inner_div_norm_mul_norm Orientation.cos_oangle_eq_inner_div_norm_mul_norm
theorem cos_oangle_eq_cos_angle {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) :
Real.Angle.cos (o.oangle x y) = Real.cos (InnerProductGeometry.angle x y) := by
rw [o.cos_oangle_eq_inner_div_norm_mul_norm hx hy, InnerProductGeometry.cos_angle]
#align orientation.cos_oangle_eq_cos_angle Orientation.cos_oangle_eq_cos_angle
theorem oangle_eq_angle_or_eq_neg_angle {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) :
o.oangle x y = InnerProductGeometry.angle x y ∨
o.oangle x y = -InnerProductGeometry.angle x y :=
Real.Angle.cos_eq_real_cos_iff_eq_or_eq_neg.1 <| o.cos_oangle_eq_cos_angle hx hy
#align orientation.oangle_eq_angle_or_eq_neg_angle Orientation.oangle_eq_angle_or_eq_neg_angle
theorem angle_eq_abs_oangle_toReal {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) :
InnerProductGeometry.angle x y = |(o.oangle x y).toReal| := by
have h0 := InnerProductGeometry.angle_nonneg x y
have hpi := InnerProductGeometry.angle_le_pi x y
rcases o.oangle_eq_angle_or_eq_neg_angle hx hy with (h | h)
· rw [h, eq_comm, Real.Angle.abs_toReal_coe_eq_self_iff]
exact ⟨h0, hpi⟩
· rw [h, eq_comm, Real.Angle.abs_toReal_neg_coe_eq_self_iff]
exact ⟨h0, hpi⟩
#align orientation.angle_eq_abs_oangle_to_real Orientation.angle_eq_abs_oangle_toReal
theorem eq_zero_or_angle_eq_zero_or_pi_of_sign_oangle_eq_zero {x y : V}
(h : (o.oangle x y).sign = 0) :
x = 0 ∨ y = 0 ∨ InnerProductGeometry.angle x y = 0 ∨ InnerProductGeometry.angle x y = π := by
by_cases hx : x = 0; · simp [hx]
by_cases hy : y = 0; · simp [hy]
rw [o.angle_eq_abs_oangle_toReal hx hy]
rw [Real.Angle.sign_eq_zero_iff] at h
rcases h with (h | h) <;> simp [h, Real.pi_pos.le]
#align orientation.eq_zero_or_angle_eq_zero_or_pi_of_sign_oangle_eq_zero Orientation.eq_zero_or_angle_eq_zero_or_pi_of_sign_oangle_eq_zero
theorem oangle_eq_of_angle_eq_of_sign_eq {w x y z : V}
(h : InnerProductGeometry.angle w x = InnerProductGeometry.angle y z)
(hs : (o.oangle w x).sign = (o.oangle y z).sign) : o.oangle w x = o.oangle y z := by
by_cases h0 : (w = 0 ∨ x = 0) ∨ y = 0 ∨ z = 0
· have hs' : (o.oangle w x).sign = 0 ∧ (o.oangle y z).sign = 0 := by
rcases h0 with ((rfl | rfl) | rfl | rfl)
· simpa using hs.symm
· simpa using hs.symm
· simpa using hs
· simpa using hs
rcases hs' with ⟨hswx, hsyz⟩
have h' : InnerProductGeometry.angle w x = π / 2 ∧ InnerProductGeometry.angle y z = π / 2 := by
rcases h0 with ((rfl | rfl) | rfl | rfl)
· simpa using h.symm
· simpa using h.symm
· simpa using h
· simpa using h
rcases h' with ⟨hwx, hyz⟩
have hpi : π / 2 ≠ π := by
intro hpi
rw [div_eq_iff, eq_comm, ← sub_eq_zero, mul_two, add_sub_cancel_right] at hpi
· exact Real.pi_pos.ne.symm hpi
· exact two_ne_zero
have h0wx : w = 0 ∨ x = 0 := by
have h0' := o.eq_zero_or_angle_eq_zero_or_pi_of_sign_oangle_eq_zero hswx
simpa [hwx, Real.pi_pos.ne.symm, hpi] using h0'
have h0yz : y = 0 ∨ z = 0 := by
have h0' := o.eq_zero_or_angle_eq_zero_or_pi_of_sign_oangle_eq_zero hsyz
simpa [hyz, Real.pi_pos.ne.symm, hpi] using h0'
rcases h0wx with (h0wx | h0wx) <;> rcases h0yz with (h0yz | h0yz) <;> simp [h0wx, h0yz]
· push_neg at h0
rw [Real.Angle.eq_iff_abs_toReal_eq_of_sign_eq hs]
rwa [o.angle_eq_abs_oangle_toReal h0.1.1 h0.1.2,
o.angle_eq_abs_oangle_toReal h0.2.1 h0.2.2] at h
#align orientation.oangle_eq_of_angle_eq_of_sign_eq Orientation.oangle_eq_of_angle_eq_of_sign_eq
theorem angle_eq_iff_oangle_eq_of_sign_eq {w x y z : V} (hw : w ≠ 0) (hx : x ≠ 0) (hy : y ≠ 0)
(hz : z ≠ 0) (hs : (o.oangle w x).sign = (o.oangle y z).sign) :
InnerProductGeometry.angle w x = InnerProductGeometry.angle y z ↔
o.oangle w x = o.oangle y z := by
refine ⟨fun h => o.oangle_eq_of_angle_eq_of_sign_eq h hs, fun h => ?_⟩
rw [o.angle_eq_abs_oangle_toReal hw hx, o.angle_eq_abs_oangle_toReal hy hz, h]
#align orientation.angle_eq_iff_oangle_eq_of_sign_eq Orientation.angle_eq_iff_oangle_eq_of_sign_eq
theorem oangle_eq_angle_of_sign_eq_one {x y : V} (h : (o.oangle x y).sign = 1) :
o.oangle x y = InnerProductGeometry.angle x y := by
by_cases hx : x = 0; · exfalso; simp [hx] at h
by_cases hy : y = 0; · exfalso; simp [hy] at h
refine (o.oangle_eq_angle_or_eq_neg_angle hx hy).resolve_right ?_
intro hxy
rw [hxy, Real.Angle.sign_neg, neg_eq_iff_eq_neg, ← SignType.neg_iff, ← not_le] at h
exact h (Real.Angle.sign_coe_nonneg_of_nonneg_of_le_pi (InnerProductGeometry.angle_nonneg _ _)
(InnerProductGeometry.angle_le_pi _ _))
#align orientation.oangle_eq_angle_of_sign_eq_one Orientation.oangle_eq_angle_of_sign_eq_one
theorem oangle_eq_neg_angle_of_sign_eq_neg_one {x y : V} (h : (o.oangle x y).sign = -1) :
o.oangle x y = -InnerProductGeometry.angle x y := by
by_cases hx : x = 0; · exfalso; simp [hx] at h
by_cases hy : y = 0; · exfalso; simp [hy] at h
refine (o.oangle_eq_angle_or_eq_neg_angle hx hy).resolve_left ?_
intro hxy
rw [hxy, ← SignType.neg_iff, ← not_le] at h
exact h (Real.Angle.sign_coe_nonneg_of_nonneg_of_le_pi (InnerProductGeometry.angle_nonneg _ _)
(InnerProductGeometry.angle_le_pi _ _))
#align orientation.oangle_eq_neg_angle_of_sign_eq_neg_one Orientation.oangle_eq_neg_angle_of_sign_eq_neg_one
theorem oangle_eq_zero_iff_angle_eq_zero {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) :
o.oangle x y = 0 ↔ InnerProductGeometry.angle x y = 0 := by
refine ⟨fun h => ?_, fun h => ?_⟩
· simpa [o.angle_eq_abs_oangle_toReal hx hy]
· have ha := o.oangle_eq_angle_or_eq_neg_angle hx hy
rw [h] at ha
simpa using ha
#align orientation.oangle_eq_zero_iff_angle_eq_zero Orientation.oangle_eq_zero_iff_angle_eq_zero
theorem oangle_eq_pi_iff_angle_eq_pi {x y : V} :
o.oangle x y = π ↔ InnerProductGeometry.angle x y = π := by
by_cases hx : x = 0
· simp [hx, Real.Angle.pi_ne_zero.symm, div_eq_mul_inv, mul_right_eq_self₀, not_or,
Real.pi_ne_zero]
by_cases hy : y = 0
· simp [hy, Real.Angle.pi_ne_zero.symm, div_eq_mul_inv, mul_right_eq_self₀, not_or,
Real.pi_ne_zero]
refine ⟨fun h => ?_, fun h => ?_⟩
· rw [o.angle_eq_abs_oangle_toReal hx hy, h]
simp [Real.pi_pos.le]
· have ha := o.oangle_eq_angle_or_eq_neg_angle hx hy
rw [h] at ha
simpa using ha
#align orientation.oangle_eq_pi_iff_angle_eq_pi Orientation.oangle_eq_pi_iff_angle_eq_pi
theorem eq_zero_or_oangle_eq_iff_inner_eq_zero {x y : V} :
x = 0 ∨ y = 0 ∨ o.oangle x y = (π / 2 : ℝ) ∨ o.oangle x y = (-π / 2 : ℝ) ↔ ⟪x, y⟫ = 0 := by
by_cases hx : x = 0; · simp [hx]
by_cases hy : y = 0; · simp [hy]
rw [InnerProductGeometry.inner_eq_zero_iff_angle_eq_pi_div_two, or_iff_right hx, or_iff_right hy]
refine ⟨fun h => ?_, fun h => ?_⟩
· rwa [o.angle_eq_abs_oangle_toReal hx hy, Real.Angle.abs_toReal_eq_pi_div_two_iff]
· convert o.oangle_eq_angle_or_eq_neg_angle hx hy using 2 <;> rw [h]
simp only [neg_div, Real.Angle.coe_neg]
#align orientation.eq_zero_or_oangle_eq_iff_inner_eq_zero Orientation.eq_zero_or_oangle_eq_iff_inner_eq_zero
theorem inner_eq_zero_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = (π / 2 : ℝ)) :
⟪x, y⟫ = 0 :=
o.eq_zero_or_oangle_eq_iff_inner_eq_zero.1 <| Or.inr <| Or.inr <| Or.inl h
#align orientation.inner_eq_zero_of_oangle_eq_pi_div_two Orientation.inner_eq_zero_of_oangle_eq_pi_div_two
theorem inner_rev_eq_zero_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = (π / 2 : ℝ)) :
⟪y, x⟫ = 0 := by rw [real_inner_comm, o.inner_eq_zero_of_oangle_eq_pi_div_two h]
#align orientation.inner_rev_eq_zero_of_oangle_eq_pi_div_two Orientation.inner_rev_eq_zero_of_oangle_eq_pi_div_two
theorem inner_eq_zero_of_oangle_eq_neg_pi_div_two {x y : V} (h : o.oangle x y = (-π / 2 : ℝ)) :
⟪x, y⟫ = 0 :=
o.eq_zero_or_oangle_eq_iff_inner_eq_zero.1 <| Or.inr <| Or.inr <| Or.inr h
#align orientation.inner_eq_zero_of_oangle_eq_neg_pi_div_two Orientation.inner_eq_zero_of_oangle_eq_neg_pi_div_two
theorem inner_rev_eq_zero_of_oangle_eq_neg_pi_div_two {x y : V} (h : o.oangle x y = (-π / 2 : ℝ)) :
⟪y, x⟫ = 0 := by rw [real_inner_comm, o.inner_eq_zero_of_oangle_eq_neg_pi_div_two h]
#align orientation.inner_rev_eq_zero_of_oangle_eq_neg_pi_div_two Orientation.inner_rev_eq_zero_of_oangle_eq_neg_pi_div_two
@[simp]
theorem oangle_sign_neg_left (x y : V) : (o.oangle (-x) y).sign = -(o.oangle x y).sign := by
by_cases hx : x = 0; · simp [hx]
by_cases hy : y = 0; · simp [hy]
rw [o.oangle_neg_left hx hy, Real.Angle.sign_add_pi]
#align orientation.oangle_sign_neg_left Orientation.oangle_sign_neg_left
@[simp]
theorem oangle_sign_neg_right (x y : V) : (o.oangle x (-y)).sign = -(o.oangle x y).sign := by
by_cases hx : x = 0; · simp [hx]
by_cases hy : y = 0; · simp [hy]
rw [o.oangle_neg_right hx hy, Real.Angle.sign_add_pi]
#align orientation.oangle_sign_neg_right Orientation.oangle_sign_neg_right
@[simp]
theorem oangle_sign_smul_left (x y : V) (r : ℝ) :
(o.oangle (r • x) y).sign = SignType.sign r * (o.oangle x y).sign := by
rcases lt_trichotomy r 0 with (h | h | h) <;> simp [h]
#align orientation.oangle_sign_smul_left Orientation.oangle_sign_smul_left
@[simp]
theorem oangle_sign_smul_right (x y : V) (r : ℝ) :
(o.oangle x (r • y)).sign = SignType.sign r * (o.oangle x y).sign := by
rcases lt_trichotomy r 0 with (h | h | h) <;> simp [h]
#align orientation.oangle_sign_smul_right Orientation.oangle_sign_smul_right
theorem oangle_smul_add_right_eq_zero_or_eq_pi_iff {x y : V} (r : ℝ) :
o.oangle x (r • x + y) = 0 ∨ o.oangle x (r • x + y) = π ↔
o.oangle x y = 0 ∨ o.oangle x y = π := by
simp_rw [oangle_eq_zero_or_eq_pi_iff_not_linearIndependent, Fintype.not_linearIndependent_iff]
-- Porting note: at this point all occurences of the bound variable `i` are of type
-- `Fin (Nat.succ (Nat.succ 0))`, but `Fin.sum_univ_two` and `Fin.exists_fin_two` expect it to be
-- `Fin 2` instead. Hence all the `conv`s.
-- Was `simp_rw [Fin.sum_univ_two, Fin.exists_fin_two]`
conv_lhs => enter [1, g, 1, 1, 2, i]; tactic => change Fin 2 at i
conv_lhs => enter [1, g]; rw [Fin.sum_univ_two]
conv_rhs => enter [1, g, 1, 1, 2, i]; tactic => change Fin 2 at i
conv_rhs => enter [1, g]; rw [Fin.sum_univ_two]
conv_lhs => enter [1, g, 2, 1, i]; tactic => change Fin 2 at i
conv_lhs => enter [1, g]; rw [Fin.exists_fin_two]
conv_rhs => enter [1, g, 2, 1, i]; tactic => change Fin 2 at i
conv_rhs => enter [1, g]; rw [Fin.exists_fin_two]
refine ⟨fun h => ?_, fun h => ?_⟩
· rcases h with ⟨m, h, hm⟩
change m 0 • x + m 1 • (r • x + y) = 0 at h
refine ⟨![m 0 + m 1 * r, m 1], ?_⟩
change (m 0 + m 1 * r) • x + m 1 • y = 0 ∧ (m 0 + m 1 * r ≠ 0 ∨ m 1 ≠ 0)
rw [smul_add, smul_smul, ← add_assoc, ← add_smul] at h
refine ⟨h, not_and_or.1 fun h0 => ?_⟩
obtain ⟨h0, h1⟩ := h0
rw [h1] at h0 hm
rw [zero_mul, add_zero] at h0
simp [h0] at hm
· rcases h with ⟨m, h, hm⟩
change m 0 • x + m 1 • y = 0 at h
refine ⟨![m 0 - m 1 * r, m 1], ?_⟩
change (m 0 - m 1 * r) • x + m 1 • (r • x + y) = 0 ∧ (m 0 - m 1 * r ≠ 0 ∨ m 1 ≠ 0)
rw [sub_smul, smul_add, smul_smul, ← add_assoc, sub_add_cancel]
refine ⟨h, not_and_or.1 fun h0 => ?_⟩
obtain ⟨h0, h1⟩ := h0
rw [h1] at h0 hm
rw [zero_mul, sub_zero] at h0
simp [h0] at hm
#align orientation.oangle_smul_add_right_eq_zero_or_eq_pi_iff Orientation.oangle_smul_add_right_eq_zero_or_eq_pi_iff
@[simp]
theorem oangle_sign_smul_add_right (x y : V) (r : ℝ) :
(o.oangle x (r • x + y)).sign = (o.oangle x y).sign := by
by_cases h : o.oangle x y = 0 ∨ o.oangle x y = π
· rwa [Real.Angle.sign_eq_zero_iff.2 h, Real.Angle.sign_eq_zero_iff,
oangle_smul_add_right_eq_zero_or_eq_pi_iff]
have h' : ∀ r' : ℝ, o.oangle x (r' • x + y) ≠ 0 ∧ o.oangle x (r' • x + y) ≠ π := by
intro r'
rwa [← o.oangle_smul_add_right_eq_zero_or_eq_pi_iff r', not_or] at h
let s : Set (V × V) := (fun r' : ℝ => (x, r' • x + y)) '' Set.univ
have hc : IsConnected s := isConnected_univ.image _ (continuous_const.prod_mk
((continuous_id.smul continuous_const).add continuous_const)).continuousOn
have hf : ContinuousOn (fun z : V × V => o.oangle z.1 z.2) s := by
refine ContinuousAt.continuousOn fun z hz => o.continuousAt_oangle ?_ ?_
all_goals
simp_rw [s, Set.mem_image] at hz
obtain ⟨r', -, rfl⟩ := hz
simp only [Prod.fst, Prod.snd]
intro hz
· simpa [hz] using (h' 0).1
· simpa [hz] using (h' r').1
have hs : ∀ z : V × V, z ∈ s → o.oangle z.1 z.2 ≠ 0 ∧ o.oangle z.1 z.2 ≠ π := by
intro z hz
simp_rw [s, Set.mem_image] at hz
obtain ⟨r', -, rfl⟩ := hz
exact h' r'
have hx : (x, y) ∈ s := by
convert Set.mem_image_of_mem (fun r' : ℝ => (x, r' • x + y)) (Set.mem_univ 0)
simp
have hy : (x, r • x + y) ∈ s := Set.mem_image_of_mem _ (Set.mem_univ _)
convert Real.Angle.sign_eq_of_continuousOn hc hf hs hx hy
#align orientation.oangle_sign_smul_add_right Orientation.oangle_sign_smul_add_right
@[simp]
theorem oangle_sign_add_smul_left (x y : V) (r : ℝ) :
(o.oangle (x + r • y) y).sign = (o.oangle x y).sign := by
simp_rw [o.oangle_rev y, Real.Angle.sign_neg, add_comm x, oangle_sign_smul_add_right]
#align orientation.oangle_sign_add_smul_left Orientation.oangle_sign_add_smul_left
@[simp]
theorem oangle_sign_sub_smul_right (x y : V) (r : ℝ) :
(o.oangle x (y - r • x)).sign = (o.oangle x y).sign := by
rw [sub_eq_add_neg, ← neg_smul, add_comm, oangle_sign_smul_add_right]
#align orientation.oangle_sign_sub_smul_right Orientation.oangle_sign_sub_smul_right
@[simp]
theorem oangle_sign_sub_smul_left (x y : V) (r : ℝ) :
(o.oangle (x - r • y) y).sign = (o.oangle x y).sign := by
rw [sub_eq_add_neg, ← neg_smul, oangle_sign_add_smul_left]
#align orientation.oangle_sign_sub_smul_left Orientation.oangle_sign_sub_smul_left
@[simp]
theorem oangle_sign_add_right (x y : V) : (o.oangle x (x + y)).sign = (o.oangle x y).sign := by
rw [← o.oangle_sign_smul_add_right x y 1, one_smul]
#align orientation.oangle_sign_add_right Orientation.oangle_sign_add_right
@[simp]
theorem oangle_sign_add_left (x y : V) : (o.oangle (x + y) y).sign = (o.oangle x y).sign := by
rw [← o.oangle_sign_add_smul_left x y 1, one_smul]
#align orientation.oangle_sign_add_left Orientation.oangle_sign_add_left
@[simp]
theorem oangle_sign_sub_right (x y : V) : (o.oangle x (y - x)).sign = (o.oangle x y).sign := by
rw [← o.oangle_sign_sub_smul_right x y 1, one_smul]
#align orientation.oangle_sign_sub_right Orientation.oangle_sign_sub_right
@[simp]
theorem oangle_sign_sub_left (x y : V) : (o.oangle (x - y) y).sign = (o.oangle x y).sign := by
rw [← o.oangle_sign_sub_smul_left x y 1, one_smul]
#align orientation.oangle_sign_sub_left Orientation.oangle_sign_sub_left
@[simp]
theorem oangle_sign_smul_sub_right (x y : V) (r : ℝ) :
(o.oangle x (r • x - y)).sign = -(o.oangle x y).sign := by
rw [← oangle_sign_neg_right, sub_eq_add_neg, oangle_sign_smul_add_right]
#align orientation.oangle_sign_smul_sub_right Orientation.oangle_sign_smul_sub_right
@[simp]
theorem oangle_sign_smul_sub_left (x y : V) (r : ℝ) :
(o.oangle (r • y - x) y).sign = -(o.oangle x y).sign := by
rw [← oangle_sign_neg_left, sub_eq_neg_add, oangle_sign_add_smul_left]
#align orientation.oangle_sign_smul_sub_left Orientation.oangle_sign_smul_sub_left
theorem oangle_sign_sub_right_eq_neg (x y : V) :
(o.oangle x (x - y)).sign = -(o.oangle x y).sign := by
rw [← o.oangle_sign_smul_sub_right x y 1, one_smul]
#align orientation.oangle_sign_sub_right_eq_neg Orientation.oangle_sign_sub_right_eq_neg
theorem oangle_sign_sub_left_eq_neg (x y : V) :
(o.oangle (y - x) y).sign = -(o.oangle x y).sign := by
rw [← o.oangle_sign_smul_sub_left x y 1, one_smul]
#align orientation.oangle_sign_sub_left_eq_neg Orientation.oangle_sign_sub_left_eq_neg
@[simp]
theorem oangle_sign_sub_right_swap (x y : V) : (o.oangle y (y - x)).sign = (o.oangle x y).sign := by
rw [oangle_sign_sub_right_eq_neg, o.oangle_rev y x, Real.Angle.sign_neg]
#align orientation.oangle_sign_sub_right_swap Orientation.oangle_sign_sub_right_swap
@[simp]
theorem oangle_sign_sub_left_swap (x y : V) : (o.oangle (x - y) x).sign = (o.oangle x y).sign := by
rw [oangle_sign_sub_left_eq_neg, o.oangle_rev y x, Real.Angle.sign_neg]
#align orientation.oangle_sign_sub_left_swap Orientation.oangle_sign_sub_left_swap
-- @[simp] -- Porting note (#10618): simp can prove this
theorem oangle_sign_smul_add_smul_right (x y : V) (r₁ r₂ : ℝ) :
(o.oangle x (r₁ • x + r₂ • y)).sign = SignType.sign r₂ * (o.oangle x y).sign := by
rw [← o.oangle_sign_smul_add_right x (r₁ • x + r₂ • y) (-r₁)]
simp
#align orientation.oangle_sign_smul_add_smul_right Orientation.oangle_sign_smul_add_smul_right
-- @[simp] -- Porting note (#10618): simp can prove this
theorem oangle_sign_smul_add_smul_left (x y : V) (r₁ r₂ : ℝ) :
(o.oangle (r₁ • x + r₂ • y) y).sign = SignType.sign r₁ * (o.oangle x y).sign := by
simp_rw [o.oangle_rev y, Real.Angle.sign_neg, add_comm (r₁ • x), oangle_sign_smul_add_smul_right,
mul_neg]
#align orientation.oangle_sign_smul_add_smul_left Orientation.oangle_sign_smul_add_smul_left
| Mathlib/Geometry/Euclidean/Angle/Oriented/Basic.lean | 1,048 | 1,060 | theorem oangle_sign_smul_add_smul_smul_add_smul (x y : V) (r₁ r₂ r₃ r₄ : ℝ) :
(o.oangle (r₁ • x + r₂ • y) (r₃ • x + r₄ • y)).sign =
SignType.sign (r₁ * r₄ - r₂ * r₃) * (o.oangle x y).sign := by |
by_cases hr₁ : r₁ = 0
· rw [hr₁, zero_smul, zero_mul, zero_add, zero_sub, Left.sign_neg,
oangle_sign_smul_left, add_comm, oangle_sign_smul_add_smul_right, oangle_rev,
Real.Angle.sign_neg, sign_mul, mul_neg, mul_neg, neg_mul, mul_assoc]
· rw [← o.oangle_sign_smul_add_right (r₁ • x + r₂ • y) (r₃ • x + r₄ • y) (-r₃ / r₁), smul_add,
smul_smul, smul_smul, div_mul_cancel₀ _ hr₁, neg_smul, ← add_assoc, add_comm (-(r₃ • x)), ←
sub_eq_add_neg, sub_add_cancel, ← add_smul, oangle_sign_smul_right,
oangle_sign_smul_add_smul_left, ← mul_assoc, ← sign_mul, add_mul, mul_assoc, mul_comm r₂ r₁, ←
mul_assoc, div_mul_cancel₀ _ hr₁, add_comm, neg_mul, ← sub_eq_add_neg, mul_comm r₄,
mul_comm r₃]
|
import Mathlib.CategoryTheory.Bicategory.Basic
import Mathlib.CategoryTheory.Monoidal.Mon_
import Mathlib.CategoryTheory.Limits.Preserves.Shapes.Equalizers
#align_import category_theory.monoidal.Bimod from "leanprover-community/mathlib"@"4698e35ca56a0d4fa53aa5639c3364e0a77f4eba"
universe v₁ v₂ u₁ u₂
open CategoryTheory
open CategoryTheory.MonoidalCategory
variable {C : Type u₁} [Category.{v₁} C] [MonoidalCategory.{v₁} C]
section
open CategoryTheory.Limits
variable [HasCoequalizers C]
section
variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)]
theorem id_tensor_π_preserves_coequalizer_inv_desc {W X Y Z : C} (f g : X ⟶ Y) (h : Z ⊗ Y ⟶ W)
(wh : (Z ◁ f) ≫ h = (Z ◁ g) ≫ h) :
(Z ◁ coequalizer.π f g) ≫
(PreservesCoequalizer.iso (tensorLeft Z) f g).inv ≫ coequalizer.desc h wh =
h :=
map_π_preserves_coequalizer_inv_desc (tensorLeft Z) f g h wh
#align id_tensor_π_preserves_coequalizer_inv_desc id_tensor_π_preserves_coequalizer_inv_desc
theorem id_tensor_π_preserves_coequalizer_inv_colimMap_desc {X Y Z X' Y' Z' : C} (f g : X ⟶ Y)
(f' g' : X' ⟶ Y') (p : Z ⊗ X ⟶ X') (q : Z ⊗ Y ⟶ Y') (wf : (Z ◁ f) ≫ q = p ≫ f')
(wg : (Z ◁ g) ≫ q = p ≫ g') (h : Y' ⟶ Z') (wh : f' ≫ h = g' ≫ h) :
(Z ◁ coequalizer.π f g) ≫
(PreservesCoequalizer.iso (tensorLeft Z) f g).inv ≫
colimMap (parallelPairHom (Z ◁ f) (Z ◁ g) f' g' p q wf wg) ≫ coequalizer.desc h wh =
q ≫ h :=
map_π_preserves_coequalizer_inv_colimMap_desc (tensorLeft Z) f g f' g' p q wf wg h wh
#align id_tensor_π_preserves_coequalizer_inv_colim_map_desc id_tensor_π_preserves_coequalizer_inv_colimMap_desc
end
section
variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)]
theorem π_tensor_id_preserves_coequalizer_inv_desc {W X Y Z : C} (f g : X ⟶ Y) (h : Y ⊗ Z ⟶ W)
(wh : (f ▷ Z) ≫ h = (g ▷ Z) ≫ h) :
(coequalizer.π f g ▷ Z) ≫
(PreservesCoequalizer.iso (tensorRight Z) f g).inv ≫ coequalizer.desc h wh =
h :=
map_π_preserves_coequalizer_inv_desc (tensorRight Z) f g h wh
#align π_tensor_id_preserves_coequalizer_inv_desc π_tensor_id_preserves_coequalizer_inv_desc
theorem π_tensor_id_preserves_coequalizer_inv_colimMap_desc {X Y Z X' Y' Z' : C} (f g : X ⟶ Y)
(f' g' : X' ⟶ Y') (p : X ⊗ Z ⟶ X') (q : Y ⊗ Z ⟶ Y') (wf : (f ▷ Z) ≫ q = p ≫ f')
(wg : (g ▷ Z) ≫ q = p ≫ g') (h : Y' ⟶ Z') (wh : f' ≫ h = g' ≫ h) :
(coequalizer.π f g ▷ Z) ≫
(PreservesCoequalizer.iso (tensorRight Z) f g).inv ≫
colimMap (parallelPairHom (f ▷ Z) (g ▷ Z) f' g' p q wf wg) ≫ coequalizer.desc h wh =
q ≫ h :=
map_π_preserves_coequalizer_inv_colimMap_desc (tensorRight Z) f g f' g' p q wf wg h wh
#align π_tensor_id_preserves_coequalizer_inv_colim_map_desc π_tensor_id_preserves_coequalizer_inv_colimMap_desc
end
end
structure Bimod (A B : Mon_ C) where
X : C
actLeft : A.X ⊗ X ⟶ X
one_actLeft : (A.one ▷ X) ≫ actLeft = (λ_ X).hom := by aesop_cat
left_assoc :
(A.mul ▷ X) ≫ actLeft = (α_ A.X A.X X).hom ≫ (A.X ◁ actLeft) ≫ actLeft := by aesop_cat
actRight : X ⊗ B.X ⟶ X
actRight_one : (X ◁ B.one) ≫ actRight = (ρ_ X).hom := by aesop_cat
right_assoc :
(X ◁ B.mul) ≫ actRight = (α_ X B.X B.X).inv ≫ (actRight ▷ B.X) ≫ actRight := by
aesop_cat
middle_assoc :
(actLeft ▷ B.X) ≫ actRight = (α_ A.X X B.X).hom ≫ (A.X ◁ actRight) ≫ actLeft := by
aesop_cat
set_option linter.uppercaseLean3 false in
#align Bimod Bimod
attribute [reassoc (attr := simp)] Bimod.one_actLeft Bimod.actRight_one Bimod.left_assoc
Bimod.right_assoc Bimod.middle_assoc
namespace Bimod
variable {A B : Mon_ C} (M : Bimod A B)
@[ext]
structure Hom (M N : Bimod A B) where
hom : M.X ⟶ N.X
left_act_hom : M.actLeft ≫ hom = (A.X ◁ hom) ≫ N.actLeft := by aesop_cat
right_act_hom : M.actRight ≫ hom = (hom ▷ B.X) ≫ N.actRight := by aesop_cat
set_option linter.uppercaseLean3 false in
#align Bimod.hom Bimod.Hom
attribute [reassoc (attr := simp)] Hom.left_act_hom Hom.right_act_hom
@[simps]
def id' (M : Bimod A B) : Hom M M where hom := 𝟙 M.X
set_option linter.uppercaseLean3 false in
#align Bimod.id' Bimod.id'
instance homInhabited (M : Bimod A B) : Inhabited (Hom M M) :=
⟨id' M⟩
set_option linter.uppercaseLean3 false in
#align Bimod.hom_inhabited Bimod.homInhabited
@[simps]
def comp {M N O : Bimod A B} (f : Hom M N) (g : Hom N O) : Hom M O where hom := f.hom ≫ g.hom
set_option linter.uppercaseLean3 false in
#align Bimod.comp Bimod.comp
instance : Category (Bimod A B) where
Hom M N := Hom M N
id := id'
comp f g := comp f g
-- Porting note: added because `Hom.ext` is not triggered automatically
@[ext]
lemma hom_ext {M N : Bimod A B} (f g : M ⟶ N) (h : f.hom = g.hom) : f = g :=
Hom.ext _ _ h
@[simp]
theorem id_hom' (M : Bimod A B) : (𝟙 M : Hom M M).hom = 𝟙 M.X :=
rfl
set_option linter.uppercaseLean3 false in
#align Bimod.id_hom' Bimod.id_hom'
@[simp]
theorem comp_hom' {M N K : Bimod A B} (f : M ⟶ N) (g : N ⟶ K) :
(f ≫ g : Hom M K).hom = f.hom ≫ g.hom :=
rfl
set_option linter.uppercaseLean3 false in
#align Bimod.comp_hom' Bimod.comp_hom'
@[simps]
def isoOfIso {X Y : Mon_ C} {P Q : Bimod X Y} (f : P.X ≅ Q.X)
(f_left_act_hom : P.actLeft ≫ f.hom = (X.X ◁ f.hom) ≫ Q.actLeft)
(f_right_act_hom : P.actRight ≫ f.hom = (f.hom ▷ Y.X) ≫ Q.actRight) : P ≅ Q where
hom :=
{ hom := f.hom }
inv :=
{ hom := f.inv
left_act_hom := by
rw [← cancel_mono f.hom, Category.assoc, Category.assoc, Iso.inv_hom_id, Category.comp_id,
f_left_act_hom, ← Category.assoc, ← MonoidalCategory.whiskerLeft_comp, Iso.inv_hom_id,
MonoidalCategory.whiskerLeft_id, Category.id_comp]
right_act_hom := by
rw [← cancel_mono f.hom, Category.assoc, Category.assoc, Iso.inv_hom_id, Category.comp_id,
f_right_act_hom, ← Category.assoc, ← comp_whiskerRight, Iso.inv_hom_id,
MonoidalCategory.id_whiskerRight, Category.id_comp] }
hom_inv_id := by ext; dsimp; rw [Iso.hom_inv_id]
inv_hom_id := by ext; dsimp; rw [Iso.inv_hom_id]
set_option linter.uppercaseLean3 false in
#align Bimod.iso_of_iso Bimod.isoOfIso
variable (A)
@[simps]
def regular : Bimod A A where
X := A.X
actLeft := A.mul
actRight := A.mul
set_option linter.uppercaseLean3 false in
#align Bimod.regular Bimod.regular
instance : Inhabited (Bimod A A) :=
⟨regular A⟩
def forget : Bimod A B ⥤ C where
obj A := A.X
map f := f.hom
set_option linter.uppercaseLean3 false in
#align Bimod.forget Bimod.forget
open CategoryTheory.Limits
variable [HasCoequalizers C]
namespace TensorBimod
variable {R S T : Mon_ C} (P : Bimod R S) (Q : Bimod S T)
noncomputable def X : C :=
coequalizer (P.actRight ▷ Q.X) ((α_ _ _ _).hom ≫ (P.X ◁ Q.actLeft))
set_option linter.uppercaseLean3 false in
#align Bimod.tensor_Bimod.X Bimod.TensorBimod.X
section
variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)]
noncomputable def actLeft : R.X ⊗ X P Q ⟶ X P Q :=
(PreservesCoequalizer.iso (tensorLeft R.X) _ _).inv ≫
colimMap
(parallelPairHom _ _ _ _
((α_ _ _ _).inv ≫ ((α_ _ _ _).inv ▷ _) ≫ (P.actLeft ▷ S.X ▷ Q.X))
((α_ _ _ _).inv ≫ (P.actLeft ▷ Q.X))
(by
dsimp
simp only [Category.assoc]
slice_lhs 1 2 => rw [associator_inv_naturality_middle]
slice_rhs 3 4 => rw [← comp_whiskerRight, middle_assoc, comp_whiskerRight]
coherence)
(by
dsimp
slice_lhs 1 1 => rw [MonoidalCategory.whiskerLeft_comp]
slice_lhs 2 3 => rw [associator_inv_naturality_right]
slice_lhs 3 4 => rw [whisker_exchange]
coherence))
set_option linter.uppercaseLean3 false in
#align Bimod.tensor_Bimod.act_left Bimod.TensorBimod.actLeft
theorem whiskerLeft_π_actLeft :
(R.X ◁ coequalizer.π _ _) ≫ actLeft P Q =
(α_ _ _ _).inv ≫ (P.actLeft ▷ Q.X) ≫ coequalizer.π _ _ := by
erw [map_π_preserves_coequalizer_inv_colimMap (tensorLeft _)]
simp only [Category.assoc]
set_option linter.uppercaseLean3 false in
#align Bimod.tensor_Bimod.id_tensor_π_act_left Bimod.TensorBimod.whiskerLeft_π_actLeft
theorem one_act_left' : (R.one ▷ _) ≫ actLeft P Q = (λ_ _).hom := by
refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_
dsimp [X]
-- Porting note: had to replace `rw` by `erw`
slice_lhs 1 2 => erw [whisker_exchange]
slice_lhs 2 3 => rw [whiskerLeft_π_actLeft]
slice_lhs 1 2 => rw [associator_inv_naturality_left]
slice_lhs 2 3 => rw [← comp_whiskerRight, one_actLeft]
slice_rhs 1 2 => rw [leftUnitor_naturality]
coherence
set_option linter.uppercaseLean3 false in
#align Bimod.tensor_Bimod.one_act_left' Bimod.TensorBimod.one_act_left'
theorem left_assoc' :
(R.mul ▷ _) ≫ actLeft P Q = (α_ R.X R.X _).hom ≫ (R.X ◁ actLeft P Q) ≫ actLeft P Q := by
refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_
dsimp [X]
slice_lhs 1 2 => rw [whisker_exchange]
slice_lhs 2 3 => rw [whiskerLeft_π_actLeft]
slice_lhs 1 2 => rw [associator_inv_naturality_left]
slice_lhs 2 3 => rw [← comp_whiskerRight, left_assoc, comp_whiskerRight, comp_whiskerRight]
slice_rhs 1 2 => rw [associator_naturality_right]
slice_rhs 2 3 =>
rw [← MonoidalCategory.whiskerLeft_comp, whiskerLeft_π_actLeft,
MonoidalCategory.whiskerLeft_comp, MonoidalCategory.whiskerLeft_comp]
slice_rhs 4 5 => rw [whiskerLeft_π_actLeft]
slice_rhs 3 4 => rw [associator_inv_naturality_middle]
coherence
set_option linter.uppercaseLean3 false in
#align Bimod.tensor_Bimod.left_assoc' Bimod.TensorBimod.left_assoc'
end
section
variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)]
noncomputable def actRight : X P Q ⊗ T.X ⟶ X P Q :=
(PreservesCoequalizer.iso (tensorRight T.X) _ _).inv ≫
colimMap
(parallelPairHom _ _ _ _
((α_ _ _ _).hom ≫ (α_ _ _ _).hom ≫ (P.X ◁ S.X ◁ Q.actRight) ≫ (α_ _ _ _).inv)
((α_ _ _ _).hom ≫ (P.X ◁ Q.actRight))
(by
dsimp
slice_lhs 1 2 => rw [associator_naturality_left]
slice_lhs 2 3 => rw [← whisker_exchange]
simp)
(by
dsimp
simp only [comp_whiskerRight, whisker_assoc, Category.assoc, Iso.inv_hom_id_assoc]
slice_lhs 3 4 =>
rw [← MonoidalCategory.whiskerLeft_comp, middle_assoc,
MonoidalCategory.whiskerLeft_comp]
simp))
set_option linter.uppercaseLean3 false in
#align Bimod.tensor_Bimod.act_right Bimod.TensorBimod.actRight
theorem π_tensor_id_actRight :
(coequalizer.π _ _ ▷ T.X) ≫ actRight P Q =
(α_ _ _ _).hom ≫ (P.X ◁ Q.actRight) ≫ coequalizer.π _ _ := by
erw [map_π_preserves_coequalizer_inv_colimMap (tensorRight _)]
simp only [Category.assoc]
set_option linter.uppercaseLean3 false in
#align Bimod.tensor_Bimod.π_tensor_id_act_right Bimod.TensorBimod.π_tensor_id_actRight
| Mathlib/CategoryTheory/Monoidal/Bimod.lean | 317 | 325 | theorem actRight_one' : (_ ◁ T.one) ≫ actRight P Q = (ρ_ _).hom := by |
refine (cancel_epi ((tensorRight _).map (coequalizer.π _ _))).1 ?_
dsimp [X]
-- Porting note: had to replace `rw` by `erw`
slice_lhs 1 2 =>erw [← whisker_exchange]
slice_lhs 2 3 => rw [π_tensor_id_actRight]
slice_lhs 1 2 => rw [associator_naturality_right]
slice_lhs 2 3 => rw [← MonoidalCategory.whiskerLeft_comp, actRight_one]
simp
|
import Mathlib.Order.Filter.Cofinite
import Mathlib.Order.ZornAtoms
#align_import order.filter.ultrafilter from "leanprover-community/mathlib"@"8631e2d5ea77f6c13054d9151d82b83069680cb1"
universe u v
variable {α : Type u} {β : Type v} {γ : Type*}
open Set Filter Function
open scoped Classical
open Filter
instance : IsAtomic (Filter α) :=
IsAtomic.of_isChain_bounded fun c hc hne hb =>
⟨sInf c, (sInf_neBot_of_directed' hne (show IsChain (· ≥ ·) c from hc.symm).directedOn hb).ne,
fun _ hx => sInf_le hx⟩
structure Ultrafilter (α : Type*) extends Filter α where
protected neBot' : NeBot toFilter
protected le_of_le : ∀ g, Filter.NeBot g → g ≤ toFilter → toFilter ≤ g
#align ultrafilter Ultrafilter
namespace Ultrafilter
variable {f g : Ultrafilter α} {s t : Set α} {p q : α → Prop}
attribute [coe] Ultrafilter.toFilter
instance : CoeTC (Ultrafilter α) (Filter α) :=
⟨Ultrafilter.toFilter⟩
instance : Membership (Set α) (Ultrafilter α) :=
⟨fun s f => s ∈ (f : Filter α)⟩
theorem unique (f : Ultrafilter α) {g : Filter α} (h : g ≤ f) (hne : NeBot g := by infer_instance) :
g = f :=
le_antisymm h <| f.le_of_le g hne h
#align ultrafilter.unique Ultrafilter.unique
instance neBot (f : Ultrafilter α) : NeBot (f : Filter α) :=
f.neBot'
#align ultrafilter.ne_bot Ultrafilter.neBot
protected theorem isAtom (f : Ultrafilter α) : IsAtom (f : Filter α) :=
⟨f.neBot.ne, fun _ hgf => by_contra fun hg => hgf.ne <| f.unique hgf.le ⟨hg⟩⟩
#align ultrafilter.is_atom Ultrafilter.isAtom
@[simp, norm_cast]
theorem mem_coe : s ∈ (f : Filter α) ↔ s ∈ f :=
Iff.rfl
#align ultrafilter.mem_coe Ultrafilter.mem_coe
theorem coe_injective : Injective ((↑) : Ultrafilter α → Filter α)
| ⟨f, h₁, h₂⟩, ⟨g, _, _⟩, _ => by congr
#align ultrafilter.coe_injective Ultrafilter.coe_injective
theorem eq_of_le {f g : Ultrafilter α} (h : (f : Filter α) ≤ g) : f = g :=
coe_injective (g.unique h)
#align ultrafilter.eq_of_le Ultrafilter.eq_of_le
@[simp, norm_cast]
theorem coe_le_coe {f g : Ultrafilter α} : (f : Filter α) ≤ g ↔ f = g :=
⟨fun h => eq_of_le h, fun h => h ▸ le_rfl⟩
#align ultrafilter.coe_le_coe Ultrafilter.coe_le_coe
@[simp, norm_cast]
theorem coe_inj : (f : Filter α) = g ↔ f = g :=
coe_injective.eq_iff
#align ultrafilter.coe_inj Ultrafilter.coe_inj
@[ext]
theorem ext ⦃f g : Ultrafilter α⦄ (h : ∀ s, s ∈ f ↔ s ∈ g) : f = g :=
coe_injective <| Filter.ext h
#align ultrafilter.ext Ultrafilter.ext
theorem le_of_inf_neBot (f : Ultrafilter α) {g : Filter α} (hg : NeBot (↑f ⊓ g)) : ↑f ≤ g :=
le_of_inf_eq (f.unique inf_le_left hg)
#align ultrafilter.le_of_inf_ne_bot Ultrafilter.le_of_inf_neBot
theorem le_of_inf_neBot' (f : Ultrafilter α) {g : Filter α} (hg : NeBot (g ⊓ f)) : ↑f ≤ g :=
f.le_of_inf_neBot <| by rwa [inf_comm]
#align ultrafilter.le_of_inf_ne_bot' Ultrafilter.le_of_inf_neBot'
theorem inf_neBot_iff {f : Ultrafilter α} {g : Filter α} : NeBot (↑f ⊓ g) ↔ ↑f ≤ g :=
⟨le_of_inf_neBot f, fun h => (inf_of_le_left h).symm ▸ f.neBot⟩
#align ultrafilter.inf_ne_bot_iff Ultrafilter.inf_neBot_iff
theorem disjoint_iff_not_le {f : Ultrafilter α} {g : Filter α} : Disjoint (↑f) g ↔ ¬↑f ≤ g := by
rw [← inf_neBot_iff, neBot_iff, Ne, not_not, disjoint_iff]
#align ultrafilter.disjoint_iff_not_le Ultrafilter.disjoint_iff_not_le
@[simp]
theorem compl_not_mem_iff : sᶜ ∉ f ↔ s ∈ f :=
⟨fun hsc =>
le_principal_iff.1 <|
f.le_of_inf_neBot ⟨fun h => hsc <| mem_of_eq_bot <| by rwa [compl_compl]⟩,
compl_not_mem⟩
#align ultrafilter.compl_not_mem_iff Ultrafilter.compl_not_mem_iff
@[simp]
theorem frequently_iff_eventually : (∃ᶠ x in f, p x) ↔ ∀ᶠ x in f, p x :=
compl_not_mem_iff
#align ultrafilter.frequently_iff_eventually Ultrafilter.frequently_iff_eventually
alias ⟨_root_.Filter.Frequently.eventually, _⟩ := frequently_iff_eventually
#align filter.frequently.eventually Filter.Frequently.eventually
theorem compl_mem_iff_not_mem : sᶜ ∈ f ↔ s ∉ f := by rw [← compl_not_mem_iff, compl_compl]
#align ultrafilter.compl_mem_iff_not_mem Ultrafilter.compl_mem_iff_not_mem
theorem diff_mem_iff (f : Ultrafilter α) : s \ t ∈ f ↔ s ∈ f ∧ t ∉ f :=
inter_mem_iff.trans <| and_congr Iff.rfl compl_mem_iff_not_mem
#align ultrafilter.diff_mem_iff Ultrafilter.diff_mem_iff
def ofComplNotMemIff (f : Filter α) (h : ∀ s, sᶜ ∉ f ↔ s ∈ f) : Ultrafilter α where
toFilter := f
neBot' := ⟨fun hf => by simp [hf] at h⟩
le_of_le g hg hgf s hs := (h s).1 fun hsc => compl_not_mem hs (hgf hsc)
#align ultrafilter.of_compl_not_mem_iff Ultrafilter.ofComplNotMemIff
def ofAtom (f : Filter α) (hf : IsAtom f) : Ultrafilter α where
toFilter := f
neBot' := ⟨hf.1⟩
le_of_le g hg := (isAtom_iff_le_of_ge.1 hf).2 g hg.ne
#align ultrafilter.of_atom Ultrafilter.ofAtom
theorem nonempty_of_mem (hs : s ∈ f) : s.Nonempty :=
Filter.nonempty_of_mem hs
#align ultrafilter.nonempty_of_mem Ultrafilter.nonempty_of_mem
theorem ne_empty_of_mem (hs : s ∈ f) : s ≠ ∅ :=
(nonempty_of_mem hs).ne_empty
#align ultrafilter.ne_empty_of_mem Ultrafilter.ne_empty_of_mem
@[simp]
theorem empty_not_mem : ∅ ∉ f :=
Filter.empty_not_mem (f : Filter α)
#align ultrafilter.empty_not_mem Ultrafilter.empty_not_mem
@[simp]
theorem le_sup_iff {u : Ultrafilter α} {f g : Filter α} : ↑u ≤ f ⊔ g ↔ ↑u ≤ f ∨ ↑u ≤ g :=
not_iff_not.1 <| by simp only [← disjoint_iff_not_le, not_or, disjoint_sup_right]
#align ultrafilter.le_sup_iff Ultrafilter.le_sup_iff
@[simp]
theorem union_mem_iff : s ∪ t ∈ f ↔ s ∈ f ∨ t ∈ f := by
simp only [← mem_coe, ← le_principal_iff, ← sup_principal, le_sup_iff]
#align ultrafilter.union_mem_iff Ultrafilter.union_mem_iff
theorem mem_or_compl_mem (f : Ultrafilter α) (s : Set α) : s ∈ f ∨ sᶜ ∈ f :=
or_iff_not_imp_left.2 compl_mem_iff_not_mem.2
#align ultrafilter.mem_or_compl_mem Ultrafilter.mem_or_compl_mem
protected theorem em (f : Ultrafilter α) (p : α → Prop) : (∀ᶠ x in f, p x) ∨ ∀ᶠ x in f, ¬p x :=
f.mem_or_compl_mem { x | p x }
#align ultrafilter.em Ultrafilter.em
theorem eventually_or : (∀ᶠ x in f, p x ∨ q x) ↔ (∀ᶠ x in f, p x) ∨ ∀ᶠ x in f, q x :=
union_mem_iff
#align ultrafilter.eventually_or Ultrafilter.eventually_or
theorem eventually_not : (∀ᶠ x in f, ¬p x) ↔ ¬∀ᶠ x in f, p x :=
compl_mem_iff_not_mem
#align ultrafilter.eventually_not Ultrafilter.eventually_not
theorem eventually_imp : (∀ᶠ x in f, p x → q x) ↔ (∀ᶠ x in f, p x) → ∀ᶠ x in f, q x := by
simp only [imp_iff_not_or, eventually_or, eventually_not]
#align ultrafilter.eventually_imp Ultrafilter.eventually_imp
theorem finite_sUnion_mem_iff {s : Set (Set α)} (hs : s.Finite) : ⋃₀ s ∈ f ↔ ∃ t ∈ s, t ∈ f :=
Finite.induction_on hs (by simp) fun _ _ his => by
simp [union_mem_iff, his, or_and_right, exists_or]
#align ultrafilter.finite_sUnion_mem_iff Ultrafilter.finite_sUnion_mem_iff
| Mathlib/Order/Filter/Ultrafilter.lean | 205 | 207 | theorem finite_biUnion_mem_iff {is : Set β} {s : β → Set α} (his : is.Finite) :
(⋃ i ∈ is, s i) ∈ f ↔ ∃ i ∈ is, s i ∈ f := by |
simp only [← sUnion_image, finite_sUnion_mem_iff (his.image s), exists_mem_image]
|
import Mathlib.Analysis.Calculus.ContDiff.Basic
import Mathlib.Analysis.Calculus.Deriv.Linear
import Mathlib.Analysis.Complex.Conformal
import Mathlib.Analysis.Calculus.Conformal.NormedSpace
#align_import analysis.complex.real_deriv from "leanprover-community/mathlib"@"3bce8d800a6f2b8f63fe1e588fd76a9ff4adcebe"
section Conformality
open Complex ContinuousLinearMap
open scoped ComplexConjugate
variable {E : Type*} [NormedAddCommGroup E] [NormedSpace ℂ E] {z : ℂ} {f : ℂ → E}
theorem DifferentiableAt.conformalAt (h : DifferentiableAt ℂ f z) (hf' : deriv f z ≠ 0) :
ConformalAt f z := by
rw [conformalAt_iff_isConformalMap_fderiv, (h.hasFDerivAt.restrictScalars ℝ).fderiv]
apply isConformalMap_complex_linear
simpa only [Ne, ext_ring_iff]
#align differentiable_at.conformal_at DifferentiableAt.conformalAt
| Mathlib/Analysis/Complex/RealDeriv.lean | 171 | 185 | theorem conformalAt_iff_differentiableAt_or_differentiableAt_comp_conj {f : ℂ → ℂ} {z : ℂ} :
ConformalAt f z ↔
(DifferentiableAt ℂ f z ∨ DifferentiableAt ℂ (f ∘ conj) (conj z)) ∧ fderiv ℝ f z ≠ 0 := by |
rw [conformalAt_iff_isConformalMap_fderiv]
rw [isConformalMap_iff_is_complex_or_conj_linear]
apply and_congr_left
intro h
have h_diff := h.imp_symm fderiv_zero_of_not_differentiableAt
apply or_congr
· rw [differentiableAt_iff_restrictScalars ℝ h_diff]
rw [← conj_conj z] at h_diff
rw [differentiableAt_iff_restrictScalars ℝ (h_diff.comp _ conjCLE.differentiableAt)]
refine exists_congr fun g => rfl.congr ?_
have : fderiv ℝ conj (conj z) = _ := conjCLE.fderiv
simp [fderiv.comp _ h_diff conjCLE.differentiableAt, this, conj_conj]
|
import Mathlib.Topology.MetricSpace.HausdorffDistance
import Mathlib.MeasureTheory.Constructions.BorelSpace.Order
#align_import measure_theory.measure.regular from "leanprover-community/mathlib"@"bf6a01357ff5684b1ebcd0f1a13be314fc82c0bf"
open Set Filter ENNReal Topology NNReal TopologicalSpace
namespace MeasureTheory
namespace Measure
def InnerRegularWRT {α} {_ : MeasurableSpace α} (μ : Measure α) (p q : Set α → Prop) :=
∀ ⦃U⦄, q U → ∀ r < μ U, ∃ K, K ⊆ U ∧ p K ∧ r < μ K
#align measure_theory.measure.inner_regular MeasureTheory.Measure.InnerRegularWRT
variable {α β : Type*} [MeasurableSpace α] [TopologicalSpace α] {μ : Measure α}
class OuterRegular (μ : Measure α) : Prop where
protected outerRegular :
∀ ⦃A : Set α⦄, MeasurableSet A → ∀ r > μ A, ∃ U, U ⊇ A ∧ IsOpen U ∧ μ U < r
#align measure_theory.measure.outer_regular MeasureTheory.Measure.OuterRegular
#align measure_theory.measure.outer_regular.outer_regular MeasureTheory.Measure.OuterRegular.outerRegular
class Regular (μ : Measure α) extends IsFiniteMeasureOnCompacts μ, OuterRegular μ : Prop where
innerRegular : InnerRegularWRT μ IsCompact IsOpen
#align measure_theory.measure.regular MeasureTheory.Measure.Regular
class WeaklyRegular (μ : Measure α) extends OuterRegular μ : Prop where
protected innerRegular : InnerRegularWRT μ IsClosed IsOpen
#align measure_theory.measure.weakly_regular MeasureTheory.Measure.WeaklyRegular
#align measure_theory.measure.weakly_regular.inner_regular MeasureTheory.Measure.WeaklyRegular.innerRegular
class InnerRegular (μ : Measure α) : Prop where
protected innerRegular : InnerRegularWRT μ IsCompact (fun s ↦ MeasurableSet s)
class InnerRegularCompactLTTop (μ : Measure α) : Prop where
protected innerRegular : InnerRegularWRT μ IsCompact (fun s ↦ MeasurableSet s ∧ μ s ≠ ∞)
-- see Note [lower instance priority]
instance (priority := 100) Regular.weaklyRegular [R1Space α] [Regular μ] :
WeaklyRegular μ where
innerRegular := fun _U hU r hr ↦
let ⟨K, KU, K_comp, hK⟩ := Regular.innerRegular hU r hr
⟨closure K, K_comp.closure_subset_of_isOpen hU KU, isClosed_closure,
hK.trans_le (measure_mono subset_closure)⟩
#align measure_theory.measure.regular.weakly_regular MeasureTheory.Measure.Regular.weaklyRegular
namespace OuterRegular
instance zero : OuterRegular (0 : Measure α) :=
⟨fun A _ _r hr => ⟨univ, subset_univ A, isOpen_univ, hr⟩⟩
#align measure_theory.measure.outer_regular.zero MeasureTheory.Measure.OuterRegular.zero
theorem _root_.Set.exists_isOpen_lt_of_lt [OuterRegular μ] (A : Set α) (r : ℝ≥0∞) (hr : μ A < r) :
∃ U, U ⊇ A ∧ IsOpen U ∧ μ U < r := by
rcases OuterRegular.outerRegular (measurableSet_toMeasurable μ A) r
(by rwa [measure_toMeasurable]) with
⟨U, hAU, hUo, hU⟩
exact ⟨U, (subset_toMeasurable _ _).trans hAU, hUo, hU⟩
#align set.exists_is_open_lt_of_lt Set.exists_isOpen_lt_of_lt
theorem _root_.Set.measure_eq_iInf_isOpen (A : Set α) (μ : Measure α) [OuterRegular μ] :
μ A = ⨅ (U : Set α) (_ : A ⊆ U) (_ : IsOpen U), μ U := by
refine le_antisymm (le_iInf₂ fun s hs => le_iInf fun _ => μ.mono hs) ?_
refine le_of_forall_lt' fun r hr => ?_
simpa only [iInf_lt_iff, exists_prop] using A.exists_isOpen_lt_of_lt r hr
#align set.measure_eq_infi_is_open Set.measure_eq_iInf_isOpen
theorem _root_.Set.exists_isOpen_lt_add [OuterRegular μ] (A : Set α) (hA : μ A ≠ ∞) {ε : ℝ≥0∞}
(hε : ε ≠ 0) : ∃ U, U ⊇ A ∧ IsOpen U ∧ μ U < μ A + ε :=
A.exists_isOpen_lt_of_lt _ (ENNReal.lt_add_right hA hε)
#align set.exists_is_open_lt_add Set.exists_isOpen_lt_add
| Mathlib/MeasureTheory/Measure/Regular.lean | 361 | 366 | theorem _root_.Set.exists_isOpen_le_add (A : Set α) (μ : Measure α) [OuterRegular μ] {ε : ℝ≥0∞}
(hε : ε ≠ 0) : ∃ U, U ⊇ A ∧ IsOpen U ∧ μ U ≤ μ A + ε := by |
rcases eq_or_ne (μ A) ∞ with (H | H)
· exact ⟨univ, subset_univ _, isOpen_univ, by simp only [H, _root_.top_add, le_top]⟩
· rcases A.exists_isOpen_lt_add H hε with ⟨U, AU, U_open, hU⟩
exact ⟨U, AU, U_open, hU.le⟩
|
import Mathlib.Probability.IdentDistrib
import Mathlib.MeasureTheory.Integral.DominatedConvergence
import Mathlib.Analysis.SpecificLimits.FloorPow
import Mathlib.Analysis.PSeries
import Mathlib.Analysis.Asymptotics.SpecificAsymptotics
#align_import probability.strong_law from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982"
noncomputable section
open MeasureTheory Filter Finset Asymptotics
open Set (indicator)
open scoped Topology MeasureTheory ProbabilityTheory ENNReal NNReal
namespace ProbabilityTheory
section Truncation
variable {α : Type*}
def truncation (f : α → ℝ) (A : ℝ) :=
indicator (Set.Ioc (-A) A) id ∘ f
#align probability_theory.truncation ProbabilityTheory.truncation
variable {m : MeasurableSpace α} {μ : Measure α} {f : α → ℝ}
theorem _root_.MeasureTheory.AEStronglyMeasurable.truncation (hf : AEStronglyMeasurable f μ)
{A : ℝ} : AEStronglyMeasurable (truncation f A) μ := by
apply AEStronglyMeasurable.comp_aemeasurable _ hf.aemeasurable
exact (stronglyMeasurable_id.indicator measurableSet_Ioc).aestronglyMeasurable
#align measure_theory.ae_strongly_measurable.truncation MeasureTheory.AEStronglyMeasurable.truncation
theorem abs_truncation_le_bound (f : α → ℝ) (A : ℝ) (x : α) : |truncation f A x| ≤ |A| := by
simp only [truncation, Set.indicator, Set.mem_Icc, id, Function.comp_apply]
split_ifs with h
· exact abs_le_abs h.2 (neg_le.2 h.1.le)
· simp [abs_nonneg]
#align probability_theory.abs_truncation_le_bound ProbabilityTheory.abs_truncation_le_bound
@[simp]
theorem truncation_zero (f : α → ℝ) : truncation f 0 = 0 := by simp [truncation]; rfl
#align probability_theory.truncation_zero ProbabilityTheory.truncation_zero
theorem abs_truncation_le_abs_self (f : α → ℝ) (A : ℝ) (x : α) : |truncation f A x| ≤ |f x| := by
simp only [truncation, indicator, Set.mem_Icc, id, Function.comp_apply]
split_ifs
· exact le_rfl
· simp [abs_nonneg]
#align probability_theory.abs_truncation_le_abs_self ProbabilityTheory.abs_truncation_le_abs_self
| Mathlib/Probability/StrongLaw.lean | 106 | 111 | theorem truncation_eq_self {f : α → ℝ} {A : ℝ} {x : α} (h : |f x| < A) :
truncation f A x = f x := by |
simp only [truncation, indicator, Set.mem_Icc, id, Function.comp_apply, ite_eq_left_iff]
intro H
apply H.elim
simp [(abs_lt.1 h).1, (abs_lt.1 h).2.le]
|
import Mathlib.Order.Filter.Ultrafilter
import Mathlib.Order.Filter.Germ
#align_import order.filter.filter_product from "leanprover-community/mathlib"@"2738d2ca56cbc63be80c3bd48e9ed90ad94e947d"
universe u v
variable {α : Type u} {β : Type v} {φ : Ultrafilter α}
open scoped Classical
namespace Filter
local notation3 "∀* "(...)", "r:(scoped p => Filter.Eventually p (Ultrafilter.toFilter φ)) => r
namespace Germ
open Ultrafilter
local notation "β*" => Germ (φ : Filter α) β
instance instGroupWithZero [GroupWithZero β] : GroupWithZero β* where
__ := instDivInvMonoid
__ := instMonoidWithZero
mul_inv_cancel f := inductionOn f fun f hf ↦ coe_eq.2 <| (φ.em fun y ↦ f y = 0).elim
(fun H ↦ (hf <| coe_eq.2 H).elim) fun H ↦ H.mono fun x ↦ mul_inv_cancel
inv_zero := coe_eq.2 <| by simp only [Function.comp, inv_zero, EventuallyEq.rfl]
instance instDivisionSemiring [DivisionSemiring β] : DivisionSemiring β* where
toSemiring := instSemiring
__ := instGroupWithZero
nnqsmul := _
instance instDivisionRing [DivisionRing β] : DivisionRing β* where
__ := instRing
__ := instDivisionSemiring
qsmul := _
instance instSemifield [Semifield β] : Semifield β* where
__ := instCommSemiring
__ := instDivisionSemiring
instance instField [Field β] : Field β* where
__ := instCommRing
__ := instDivisionRing
theorem coe_lt [Preorder β] {f g : α → β} : (f : β*) < g ↔ ∀* x, f x < g x := by
simp only [lt_iff_le_not_le, eventually_and, coe_le, eventually_not, EventuallyLE]
#align filter.germ.coe_lt Filter.Germ.coe_lt
theorem coe_pos [Preorder β] [Zero β] {f : α → β} : 0 < (f : β*) ↔ ∀* x, 0 < f x :=
coe_lt
#align filter.germ.coe_pos Filter.Germ.coe_pos
theorem const_lt [Preorder β] {x y : β} : x < y → (↑x : β*) < ↑y :=
coe_lt.mpr ∘ liftRel_const
#align filter.germ.const_lt Filter.Germ.const_lt
@[simp, norm_cast]
theorem const_lt_iff [Preorder β] {x y : β} : (↑x : β*) < ↑y ↔ x < y :=
coe_lt.trans liftRel_const_iff
#align filter.germ.const_lt_iff Filter.Germ.const_lt_iff
theorem lt_def [Preorder β] : ((· < ·) : β* → β* → Prop) = LiftRel (· < ·) := by
ext ⟨f⟩ ⟨g⟩
exact coe_lt
#align filter.germ.lt_def Filter.Germ.lt_def
instance isTotal [LE β] [IsTotal β (· ≤ ·)] : IsTotal β* (· ≤ ·) :=
⟨fun f g =>
inductionOn₂ f g fun _f _g => eventually_or.1 <| eventually_of_forall fun _x => total_of _ _ _⟩
noncomputable instance instLinearOrder [LinearOrder β] : LinearOrder β* :=
Lattice.toLinearOrder _
@[to_additive]
noncomputable instance linearOrderedCommGroup [LinearOrderedCommGroup β] :
LinearOrderedCommGroup β* where
__ := instOrderedCommGroup
__ := instLinearOrder
instance instStrictOrderedSemiring [StrictOrderedSemiring β] : StrictOrderedSemiring β* where
__ := instOrderedSemiring
__ := instOrderedAddCancelCommMonoid
mul_lt_mul_of_pos_left x y z := inductionOn₃ x y z fun _f _g _h hfg hh ↦
coe_lt.2 <| (coe_lt.1 hh).mp <| (coe_lt.1 hfg).mono fun _a ↦ mul_lt_mul_of_pos_left
mul_lt_mul_of_pos_right x y z := inductionOn₃ x y z fun _f _g _h hfg hh ↦
coe_lt.2 <| (coe_lt.1 hh).mp <| (coe_lt.1 hfg).mono fun _a ↦ mul_lt_mul_of_pos_right
instance instStrictOrderedCommSemiring [StrictOrderedCommSemiring β] :
StrictOrderedCommSemiring β* where
__ := instStrictOrderedSemiring
__ := instOrderedCommSemiring
instance instStrictOrderedRing [StrictOrderedRing β] : StrictOrderedRing β* where
__ := instRing
__ := instStrictOrderedSemiring
zero_le_one := const_le zero_le_one
mul_pos x y := inductionOn₂ x y fun _f _g hf hg ↦
coe_pos.2 <| (coe_pos.1 hg).mp <| (coe_pos.1 hf).mono fun _x ↦ mul_pos
instance instStrictOrderedCommRing [StrictOrderedCommRing β] : StrictOrderedCommRing β* where
__ := instStrictOrderedRing
__ := instOrderedCommRing
noncomputable instance instLinearOrderedRing [LinearOrderedRing β] : LinearOrderedRing β* where
__ := instStrictOrderedRing
__ := instLinearOrder
noncomputable instance instLinearOrderedField [LinearOrderedField β] : LinearOrderedField β* where
__ := instLinearOrderedRing
__ := instField
noncomputable instance instLinearOrderedCommRing [LinearOrderedCommRing β] :
LinearOrderedCommRing β* where
__ := instLinearOrderedRing
__ := instCommMonoid
theorem max_def [LinearOrder β] (x y : β*) : max x y = map₂ max x y :=
inductionOn₂ x y fun a b => by
rcases le_total (a : β*) b with h | h
· rw [max_eq_right h, map₂_coe, coe_eq]
exact h.mono fun i hi => (max_eq_right hi).symm
· rw [max_eq_left h, map₂_coe, coe_eq]
exact h.mono fun i hi => (max_eq_left hi).symm
#align filter.germ.max_def Filter.Germ.max_def
theorem min_def [K : LinearOrder β] (x y : β*) : min x y = map₂ min x y :=
inductionOn₂ x y fun a b => by
rcases le_total (a : β*) b with h | h
· rw [min_eq_left h, map₂_coe, coe_eq]
exact h.mono fun i hi => (min_eq_left hi).symm
· rw [min_eq_right h, map₂_coe, coe_eq]
exact h.mono fun i hi => (min_eq_right hi).symm
#align filter.germ.min_def Filter.Germ.min_def
theorem abs_def [LinearOrderedAddCommGroup β] (x : β*) : |x| = map abs x :=
inductionOn x fun _a => rfl
#align filter.germ.abs_def Filter.Germ.abs_def
@[simp]
theorem const_max [LinearOrder β] (x y : β) : (↑(max x y : β) : β*) = max ↑x ↑y := by
rw [max_def, map₂_const]
#align filter.germ.const_max Filter.Germ.const_max
@[simp]
| Mathlib/Order/Filter/FilterProduct.lean | 166 | 167 | theorem const_min [LinearOrder β] (x y : β) : (↑(min x y : β) : β*) = min ↑x ↑y := by |
rw [min_def, map₂_const]
|
import Mathlib.Order.Filter.Bases
#align_import order.filter.pi from "leanprover-community/mathlib"@"ce64cd319bb6b3e82f31c2d38e79080d377be451"
open Set Function
open scoped Classical
open Filter
namespace Filter
variable {ι : Type*} {α : ι → Type*} {f f₁ f₂ : (i : ι) → Filter (α i)} {s : (i : ι) → Set (α i)}
{p : ∀ i, α i → Prop}
section CoprodCat
-- for "Coprod"
set_option linter.uppercaseLean3 false
protected def coprodᵢ (f : ∀ i, Filter (α i)) : Filter (∀ i, α i) :=
⨆ i : ι, comap (eval i) (f i)
#align filter.Coprod Filter.coprodᵢ
| Mathlib/Order/Filter/Pi.lean | 229 | 230 | theorem mem_coprodᵢ_iff {s : Set (∀ i, α i)} :
s ∈ Filter.coprodᵢ f ↔ ∀ i : ι, ∃ t₁ ∈ f i, eval i ⁻¹' t₁ ⊆ s := by | simp [Filter.coprodᵢ]
|
import Batteries.Data.Fin.Basic
namespace Fin
attribute [norm_cast] val_last
protected theorem le_antisymm_iff {x y : Fin n} : x = y ↔ x ≤ y ∧ y ≤ x :=
Fin.ext_iff.trans Nat.le_antisymm_iff
protected theorem le_antisymm {x y : Fin n} (h1 : x ≤ y) (h2 : y ≤ x) : x = y :=
Fin.le_antisymm_iff.2 ⟨h1, h2⟩
@[simp] theorem coe_clamp (n m : Nat) : (clamp n m : Nat) = min n m := rfl
@[simp] theorem size_enum (n) : (enum n).size = n := Array.size_ofFn ..
@[simp] theorem enum_zero : (enum 0) = #[] := by simp [enum, Array.ofFn, Array.ofFn.go]
@[simp] theorem getElem_enum (i) (h : i < (enum n).size) : (enum n)[i] = ⟨i, size_enum n ▸ h⟩ :=
Array.getElem_ofFn ..
@[simp] theorem length_list (n) : (list n).length = n := by simp [list]
@[simp] theorem get_list (i : Fin (list n).length) : (list n).get i = i.cast (length_list n) := by
cases i; simp only [list]; rw [← Array.getElem_eq_data_get, getElem_enum, cast_mk]
@[simp] theorem list_zero : list 0 = [] := by simp [list]
theorem list_succ (n) : list (n+1) = 0 :: (list n).map Fin.succ := by
apply List.ext_get; simp; intro i; cases i <;> simp
theorem list_succ_last (n) : list (n+1) = (list n).map castSucc ++ [last n] := by
rw [list_succ]
induction n with
| zero => rfl
| succ n ih =>
rw [list_succ, List.map_cons castSucc, ih]
simp [Function.comp_def, succ_castSucc]
theorem list_reverse (n) : (list n).reverse = (list n).map rev := by
induction n with
| zero => rfl
| succ n ih =>
conv => lhs; rw [list_succ_last]
conv => rhs; rw [list_succ]
simp [List.reverse_map, ih, Function.comp_def, rev_succ]
theorem foldl_loop_lt (f : α → Fin n → α) (x) (h : m < n) :
foldl.loop n f x m = foldl.loop n f (f x ⟨m, h⟩) (m+1) := by
rw [foldl.loop, dif_pos h]
theorem foldl_loop_eq (f : α → Fin n → α) (x) : foldl.loop n f x n = x := by
rw [foldl.loop, dif_neg (Nat.lt_irrefl _)]
theorem foldl_loop (f : α → Fin (n+1) → α) (x) (h : m < n+1) :
foldl.loop (n+1) f x m = foldl.loop n (fun x i => f x i.succ) (f x ⟨m, h⟩) m := by
if h' : m < n then
rw [foldl_loop_lt _ _ h, foldl_loop_lt _ _ h', foldl_loop]; rfl
else
cases Nat.le_antisymm (Nat.le_of_lt_succ h) (Nat.not_lt.1 h')
rw [foldl_loop_lt, foldl_loop_eq, foldl_loop_eq]
termination_by n - m
@[simp] theorem foldl_zero (f : α → Fin 0 → α) (x) : foldl 0 f x = x := by simp [foldl, foldl.loop]
theorem foldl_succ (f : α → Fin (n+1) → α) (x) :
foldl (n+1) f x = foldl n (fun x i => f x i.succ) (f x 0) := foldl_loop ..
theorem foldl_succ_last (f : α → Fin (n+1) → α) (x) :
foldl (n+1) f x = f (foldl n (f · ·.castSucc) x) (last n) := by
rw [foldl_succ]
induction n generalizing x with
| zero => simp [foldl_succ, Fin.last]
| succ n ih => rw [foldl_succ, ih (f · ·.succ), foldl_succ]; simp [succ_castSucc]
| .lake/packages/batteries/Batteries/Data/Fin/Lemmas.lean | 87 | 90 | theorem foldl_eq_foldl_list (f : α → Fin n → α) (x) : foldl n f x = (list n).foldl f x := by |
induction n generalizing x with
| zero => rw [foldl_zero, list_zero, List.foldl_nil]
| succ n ih => rw [foldl_succ, ih, list_succ, List.foldl_cons, List.foldl_map]
|
import Mathlib.Analysis.InnerProductSpace.Projection
import Mathlib.MeasureTheory.Function.ConditionalExpectation.Unique
import Mathlib.MeasureTheory.Function.L2Space
#align_import measure_theory.function.conditional_expectation.condexp_L2 from "leanprover-community/mathlib"@"d8bbb04e2d2a44596798a9207ceefc0fb236e41e"
set_option linter.uppercaseLean3 false
open TopologicalSpace Filter ContinuousLinearMap
open scoped ENNReal Topology MeasureTheory
namespace MeasureTheory
variable {α E E' F G G' 𝕜 : Type*} {p : ℝ≥0∞} [RCLike 𝕜]
-- 𝕜 for ℝ or ℂ
-- E for an inner product space
[NormedAddCommGroup E]
[InnerProductSpace 𝕜 E] [CompleteSpace E]
-- E' for an inner product space on which we compute integrals
[NormedAddCommGroup E']
[InnerProductSpace 𝕜 E'] [CompleteSpace E'] [NormedSpace ℝ E']
-- F for a Lp submodule
[NormedAddCommGroup F]
[NormedSpace 𝕜 F]
-- G for a Lp add_subgroup
[NormedAddCommGroup G]
-- G' for integrals on a Lp add_subgroup
[NormedAddCommGroup G']
[NormedSpace ℝ G'] [CompleteSpace G']
variable {m m0 : MeasurableSpace α} {μ : Measure α} {s t : Set α}
local notation "⟪" x ", " y "⟫" => @inner 𝕜 E _ x y
local notation "⟪" x ", " y "⟫₂" => @inner 𝕜 (α →₂[μ] E) _ x y
-- Porting note: the argument `E` of `condexpL2` is not automatically filled in Lean 4.
-- To avoid typing `(E := _)` every time it is made explicit.
variable (E 𝕜)
noncomputable def condexpL2 (hm : m ≤ m0) : (α →₂[μ] E) →L[𝕜] lpMeas E 𝕜 m 2 μ :=
@orthogonalProjection 𝕜 (α →₂[μ] E) _ _ _ (lpMeas E 𝕜 m 2 μ)
haveI : Fact (m ≤ m0) := ⟨hm⟩
inferInstance
#align measure_theory.condexp_L2 MeasureTheory.condexpL2
variable {E 𝕜}
theorem aeStronglyMeasurable'_condexpL2 (hm : m ≤ m0) (f : α →₂[μ] E) :
AEStronglyMeasurable' (β := E) m (condexpL2 E 𝕜 hm f) μ :=
lpMeas.aeStronglyMeasurable' _
#align measure_theory.ae_strongly_measurable'_condexp_L2 MeasureTheory.aeStronglyMeasurable'_condexpL2
theorem integrableOn_condexpL2_of_measure_ne_top (hm : m ≤ m0) (hμs : μ s ≠ ∞) (f : α →₂[μ] E) :
IntegrableOn (E := E) (condexpL2 E 𝕜 hm f) s μ :=
integrableOn_Lp_of_measure_ne_top (condexpL2 E 𝕜 hm f : α →₂[μ] E) fact_one_le_two_ennreal.elim
hμs
#align measure_theory.integrable_on_condexp_L2_of_measure_ne_top MeasureTheory.integrableOn_condexpL2_of_measure_ne_top
theorem integrable_condexpL2_of_isFiniteMeasure (hm : m ≤ m0) [IsFiniteMeasure μ] {f : α →₂[μ] E} :
Integrable (β := E) (condexpL2 E 𝕜 hm f) μ :=
integrableOn_univ.mp <| integrableOn_condexpL2_of_measure_ne_top hm (measure_ne_top _ _) f
#align measure_theory.integrable_condexp_L2_of_is_finite_measure MeasureTheory.integrable_condexpL2_of_isFiniteMeasure
theorem norm_condexpL2_le_one (hm : m ≤ m0) : ‖@condexpL2 α E 𝕜 _ _ _ _ _ _ μ hm‖ ≤ 1 :=
haveI : Fact (m ≤ m0) := ⟨hm⟩
orthogonalProjection_norm_le _
#align measure_theory.norm_condexp_L2_le_one MeasureTheory.norm_condexpL2_le_one
theorem norm_condexpL2_le (hm : m ≤ m0) (f : α →₂[μ] E) : ‖condexpL2 E 𝕜 hm f‖ ≤ ‖f‖ :=
((@condexpL2 _ E 𝕜 _ _ _ _ _ _ μ hm).le_opNorm f).trans
(mul_le_of_le_one_left (norm_nonneg _) (norm_condexpL2_le_one hm))
#align measure_theory.norm_condexp_L2_le MeasureTheory.norm_condexpL2_le
theorem snorm_condexpL2_le (hm : m ≤ m0) (f : α →₂[μ] E) :
snorm (F := E) (condexpL2 E 𝕜 hm f) 2 μ ≤ snorm f 2 μ := by
rw [lpMeas_coe, ← ENNReal.toReal_le_toReal (Lp.snorm_ne_top _) (Lp.snorm_ne_top _), ←
Lp.norm_def, ← Lp.norm_def, Submodule.norm_coe]
exact norm_condexpL2_le hm f
#align measure_theory.snorm_condexp_L2_le MeasureTheory.snorm_condexpL2_le
theorem norm_condexpL2_coe_le (hm : m ≤ m0) (f : α →₂[μ] E) :
‖(condexpL2 E 𝕜 hm f : α →₂[μ] E)‖ ≤ ‖f‖ := by
rw [Lp.norm_def, Lp.norm_def, ← lpMeas_coe]
refine (ENNReal.toReal_le_toReal ?_ (Lp.snorm_ne_top _)).mpr (snorm_condexpL2_le hm f)
exact Lp.snorm_ne_top _
#align measure_theory.norm_condexp_L2_coe_le MeasureTheory.norm_condexpL2_coe_le
theorem inner_condexpL2_left_eq_right (hm : m ≤ m0) {f g : α →₂[μ] E} :
⟪(condexpL2 E 𝕜 hm f : α →₂[μ] E), g⟫₂ = ⟪f, (condexpL2 E 𝕜 hm g : α →₂[μ] E)⟫₂ :=
haveI : Fact (m ≤ m0) := ⟨hm⟩
inner_orthogonalProjection_left_eq_right _ f g
#align measure_theory.inner_condexp_L2_left_eq_right MeasureTheory.inner_condexpL2_left_eq_right
theorem condexpL2_indicator_of_measurable (hm : m ≤ m0) (hs : MeasurableSet[m] s) (hμs : μ s ≠ ∞)
(c : E) :
(condexpL2 E 𝕜 hm (indicatorConstLp 2 (hm s hs) hμs c) : α →₂[μ] E) =
indicatorConstLp 2 (hm s hs) hμs c := by
rw [condexpL2]
haveI : Fact (m ≤ m0) := ⟨hm⟩
have h_mem : indicatorConstLp 2 (hm s hs) hμs c ∈ lpMeas E 𝕜 m 2 μ :=
mem_lpMeas_indicatorConstLp hm hs hμs
let ind := (⟨indicatorConstLp 2 (hm s hs) hμs c, h_mem⟩ : lpMeas E 𝕜 m 2 μ)
have h_coe_ind : (ind : α →₂[μ] E) = indicatorConstLp 2 (hm s hs) hμs c := rfl
have h_orth_mem := orthogonalProjection_mem_subspace_eq_self ind
rw [← h_coe_ind, h_orth_mem]
#align measure_theory.condexp_L2_indicator_of_measurable MeasureTheory.condexpL2_indicator_of_measurable
| Mathlib/MeasureTheory/Function/ConditionalExpectation/CondexpL2.lean | 140 | 145 | theorem inner_condexpL2_eq_inner_fun (hm : m ≤ m0) (f g : α →₂[μ] E)
(hg : AEStronglyMeasurable' m g μ) :
⟪(condexpL2 E 𝕜 hm f : α →₂[μ] E), g⟫₂ = ⟪f, g⟫₂ := by |
symm
rw [← sub_eq_zero, ← inner_sub_left, condexpL2]
simp only [mem_lpMeas_iff_aeStronglyMeasurable'.mpr hg, orthogonalProjection_inner_eq_zero f g]
|
import Mathlib.LinearAlgebra.AffineSpace.AffineMap
import Mathlib.Tactic.FieldSimp
#align_import linear_algebra.affine_space.slope from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a"
open AffineMap
variable {k E PE : Type*} [Field k] [AddCommGroup E] [Module k E] [AddTorsor E PE]
def slope (f : k → PE) (a b : k) : E :=
(b - a)⁻¹ • (f b -ᵥ f a)
#align slope slope
theorem slope_fun_def (f : k → PE) : slope f = fun a b => (b - a)⁻¹ • (f b -ᵥ f a) :=
rfl
#align slope_fun_def slope_fun_def
theorem slope_def_field (f : k → k) (a b : k) : slope f a b = (f b - f a) / (b - a) :=
(div_eq_inv_mul _ _).symm
#align slope_def_field slope_def_field
theorem slope_fun_def_field (f : k → k) (a : k) : slope f a = fun b => (f b - f a) / (b - a) :=
(div_eq_inv_mul _ _).symm
#align slope_fun_def_field slope_fun_def_field
@[simp]
theorem slope_same (f : k → PE) (a : k) : (slope f a a : E) = 0 := by
rw [slope, sub_self, inv_zero, zero_smul]
#align slope_same slope_same
theorem slope_def_module (f : k → E) (a b : k) : slope f a b = (b - a)⁻¹ • (f b - f a) :=
rfl
#align slope_def_module slope_def_module
@[simp]
theorem sub_smul_slope (f : k → PE) (a b : k) : (b - a) • slope f a b = f b -ᵥ f a := by
rcases eq_or_ne a b with (rfl | hne)
· rw [sub_self, zero_smul, vsub_self]
· rw [slope, smul_inv_smul₀ (sub_ne_zero.2 hne.symm)]
#align sub_smul_slope sub_smul_slope
theorem sub_smul_slope_vadd (f : k → PE) (a b : k) : (b - a) • slope f a b +ᵥ f a = f b := by
rw [sub_smul_slope, vsub_vadd]
#align sub_smul_slope_vadd sub_smul_slope_vadd
@[simp]
theorem slope_vadd_const (f : k → E) (c : PE) : (slope fun x => f x +ᵥ c) = slope f := by
ext a b
simp only [slope, vadd_vsub_vadd_cancel_right, vsub_eq_sub]
#align slope_vadd_const slope_vadd_const
@[simp]
theorem slope_sub_smul (f : k → E) {a b : k} (h : a ≠ b) :
slope (fun x => (x - a) • f x) a b = f b := by
simp [slope, inv_smul_smul₀ (sub_ne_zero.2 h.symm)]
#align slope_sub_smul slope_sub_smul
theorem eq_of_slope_eq_zero {f : k → PE} {a b : k} (h : slope f a b = (0 : E)) : f a = f b := by
rw [← sub_smul_slope_vadd f a b, h, smul_zero, zero_vadd]
#align eq_of_slope_eq_zero eq_of_slope_eq_zero
theorem AffineMap.slope_comp {F PF : Type*} [AddCommGroup F] [Module k F] [AddTorsor F PF]
(f : PE →ᵃ[k] PF) (g : k → PE) (a b : k) : slope (f ∘ g) a b = f.linear (slope g a b) := by
simp only [slope, (· ∘ ·), f.linear.map_smul, f.linearMap_vsub]
#align affine_map.slope_comp AffineMap.slope_comp
theorem LinearMap.slope_comp {F : Type*} [AddCommGroup F] [Module k F] (f : E →ₗ[k] F) (g : k → E)
(a b : k) : slope (f ∘ g) a b = f (slope g a b) :=
f.toAffineMap.slope_comp g a b
#align linear_map.slope_comp LinearMap.slope_comp
theorem slope_comm (f : k → PE) (a b : k) : slope f a b = slope f b a := by
rw [slope, slope, ← neg_vsub_eq_vsub_rev, smul_neg, ← neg_smul, neg_inv, neg_sub]
#align slope_comm slope_comm
@[simp] lemma slope_neg (f : k → E) (x y : k) : slope (fun t ↦ -f t) x y = -slope f x y := by
simp only [slope_def_module, neg_sub_neg, ← smul_neg, neg_sub]
theorem sub_div_sub_smul_slope_add_sub_div_sub_smul_slope (f : k → PE) (a b c : k) :
((b - a) / (c - a)) • slope f a b + ((c - b) / (c - a)) • slope f b c = slope f a c := by
by_cases hab : a = b
· subst hab
rw [sub_self, zero_div, zero_smul, zero_add]
by_cases hac : a = c
· simp [hac]
· rw [div_self (sub_ne_zero.2 <| Ne.symm hac), one_smul]
by_cases hbc : b = c;
· subst hbc
simp [sub_ne_zero.2 (Ne.symm hab)]
rw [add_comm]
simp_rw [slope, div_eq_inv_mul, mul_smul, ← smul_add,
smul_inv_smul₀ (sub_ne_zero.2 <| Ne.symm hab), smul_inv_smul₀ (sub_ne_zero.2 <| Ne.symm hbc),
vsub_add_vsub_cancel]
#align sub_div_sub_smul_slope_add_sub_div_sub_smul_slope sub_div_sub_smul_slope_add_sub_div_sub_smul_slope
| Mathlib/LinearAlgebra/AffineSpace/Slope.lean | 121 | 124 | theorem lineMap_slope_slope_sub_div_sub (f : k → PE) (a b c : k) (h : a ≠ c) :
lineMap (slope f a b) (slope f b c) ((c - b) / (c - a)) = slope f a c := by |
field_simp [sub_ne_zero.2 h.symm, ← sub_div_sub_smul_slope_add_sub_div_sub_smul_slope f a b c,
lineMap_apply_module]
|
import Mathlib.Topology.Order.MonotoneContinuity
import Mathlib.Topology.Algebra.Order.LiminfLimsup
import Mathlib.Topology.Instances.NNReal
import Mathlib.Topology.EMetricSpace.Lipschitz
import Mathlib.Topology.Metrizable.Basic
import Mathlib.Topology.Order.T5
#align_import topology.instances.ennreal from "leanprover-community/mathlib"@"ec4b2eeb50364487f80421c0b4c41328a611f30d"
noncomputable section
open Set Filter Metric Function
open scoped Classical Topology ENNReal NNReal Filter
variable {α : Type*} {β : Type*} {γ : Type*}
namespace ENNReal
variable {a b c d : ℝ≥0∞} {r p q : ℝ≥0} {x y z : ℝ≥0∞} {ε ε₁ ε₂ : ℝ≥0∞} {s : Set ℝ≥0∞}
section TopologicalSpace
open TopologicalSpace
instance : TopologicalSpace ℝ≥0∞ := Preorder.topology ℝ≥0∞
instance : OrderTopology ℝ≥0∞ := ⟨rfl⟩
-- short-circuit type class inference
instance : T2Space ℝ≥0∞ := inferInstance
instance : T5Space ℝ≥0∞ := inferInstance
instance : T4Space ℝ≥0∞ := inferInstance
instance : SecondCountableTopology ℝ≥0∞ :=
orderIsoUnitIntervalBirational.toHomeomorph.embedding.secondCountableTopology
instance : MetrizableSpace ENNReal :=
orderIsoUnitIntervalBirational.toHomeomorph.embedding.metrizableSpace
theorem embedding_coe : Embedding ((↑) : ℝ≥0 → ℝ≥0∞) :=
coe_strictMono.embedding_of_ordConnected <| by rw [range_coe']; exact ordConnected_Iio
#align ennreal.embedding_coe ENNReal.embedding_coe
theorem isOpen_ne_top : IsOpen { a : ℝ≥0∞ | a ≠ ∞ } := isOpen_ne
#align ennreal.is_open_ne_top ENNReal.isOpen_ne_top
theorem isOpen_Ico_zero : IsOpen (Ico 0 b) := by
rw [ENNReal.Ico_eq_Iio]
exact isOpen_Iio
#align ennreal.is_open_Ico_zero ENNReal.isOpen_Ico_zero
theorem openEmbedding_coe : OpenEmbedding ((↑) : ℝ≥0 → ℝ≥0∞) :=
⟨embedding_coe, by rw [range_coe']; exact isOpen_Iio⟩
#align ennreal.open_embedding_coe ENNReal.openEmbedding_coe
theorem coe_range_mem_nhds : range ((↑) : ℝ≥0 → ℝ≥0∞) ∈ 𝓝 (r : ℝ≥0∞) :=
IsOpen.mem_nhds openEmbedding_coe.isOpen_range <| mem_range_self _
#align ennreal.coe_range_mem_nhds ENNReal.coe_range_mem_nhds
@[norm_cast]
theorem tendsto_coe {f : Filter α} {m : α → ℝ≥0} {a : ℝ≥0} :
Tendsto (fun a => (m a : ℝ≥0∞)) f (𝓝 ↑a) ↔ Tendsto m f (𝓝 a) :=
embedding_coe.tendsto_nhds_iff.symm
#align ennreal.tendsto_coe ENNReal.tendsto_coe
theorem continuous_coe : Continuous ((↑) : ℝ≥0 → ℝ≥0∞) :=
embedding_coe.continuous
#align ennreal.continuous_coe ENNReal.continuous_coe
theorem continuous_coe_iff {α} [TopologicalSpace α] {f : α → ℝ≥0} :
(Continuous fun a => (f a : ℝ≥0∞)) ↔ Continuous f :=
embedding_coe.continuous_iff.symm
#align ennreal.continuous_coe_iff ENNReal.continuous_coe_iff
theorem nhds_coe {r : ℝ≥0} : 𝓝 (r : ℝ≥0∞) = (𝓝 r).map (↑) :=
(openEmbedding_coe.map_nhds_eq r).symm
#align ennreal.nhds_coe ENNReal.nhds_coe
theorem tendsto_nhds_coe_iff {α : Type*} {l : Filter α} {x : ℝ≥0} {f : ℝ≥0∞ → α} :
Tendsto f (𝓝 ↑x) l ↔ Tendsto (f ∘ (↑) : ℝ≥0 → α) (𝓝 x) l := by
rw [nhds_coe, tendsto_map'_iff]
#align ennreal.tendsto_nhds_coe_iff ENNReal.tendsto_nhds_coe_iff
theorem continuousAt_coe_iff {α : Type*} [TopologicalSpace α] {x : ℝ≥0} {f : ℝ≥0∞ → α} :
ContinuousAt f ↑x ↔ ContinuousAt (f ∘ (↑) : ℝ≥0 → α) x :=
tendsto_nhds_coe_iff
#align ennreal.continuous_at_coe_iff ENNReal.continuousAt_coe_iff
theorem nhds_coe_coe {r p : ℝ≥0} :
𝓝 ((r : ℝ≥0∞), (p : ℝ≥0∞)) = (𝓝 (r, p)).map fun p : ℝ≥0 × ℝ≥0 => (↑p.1, ↑p.2) :=
((openEmbedding_coe.prod openEmbedding_coe).map_nhds_eq (r, p)).symm
#align ennreal.nhds_coe_coe ENNReal.nhds_coe_coe
theorem continuous_ofReal : Continuous ENNReal.ofReal :=
(continuous_coe_iff.2 continuous_id).comp continuous_real_toNNReal
#align ennreal.continuous_of_real ENNReal.continuous_ofReal
theorem tendsto_ofReal {f : Filter α} {m : α → ℝ} {a : ℝ} (h : Tendsto m f (𝓝 a)) :
Tendsto (fun a => ENNReal.ofReal (m a)) f (𝓝 (ENNReal.ofReal a)) :=
(continuous_ofReal.tendsto a).comp h
#align ennreal.tendsto_of_real ENNReal.tendsto_ofReal
theorem tendsto_toNNReal {a : ℝ≥0∞} (ha : a ≠ ∞) :
Tendsto ENNReal.toNNReal (𝓝 a) (𝓝 a.toNNReal) := by
lift a to ℝ≥0 using ha
rw [nhds_coe, tendsto_map'_iff]
exact tendsto_id
#align ennreal.tendsto_to_nnreal ENNReal.tendsto_toNNReal
theorem eventuallyEq_of_toReal_eventuallyEq {l : Filter α} {f g : α → ℝ≥0∞}
(hfi : ∀ᶠ x in l, f x ≠ ∞) (hgi : ∀ᶠ x in l, g x ≠ ∞)
(hfg : (fun x => (f x).toReal) =ᶠ[l] fun x => (g x).toReal) : f =ᶠ[l] g := by
filter_upwards [hfi, hgi, hfg] with _ hfx hgx _
rwa [← ENNReal.toReal_eq_toReal hfx hgx]
#align ennreal.eventually_eq_of_to_real_eventually_eq ENNReal.eventuallyEq_of_toReal_eventuallyEq
theorem continuousOn_toNNReal : ContinuousOn ENNReal.toNNReal { a | a ≠ ∞ } := fun _a ha =>
ContinuousAt.continuousWithinAt (tendsto_toNNReal ha)
#align ennreal.continuous_on_to_nnreal ENNReal.continuousOn_toNNReal
theorem tendsto_toReal {a : ℝ≥0∞} (ha : a ≠ ∞) : Tendsto ENNReal.toReal (𝓝 a) (𝓝 a.toReal) :=
NNReal.tendsto_coe.2 <| tendsto_toNNReal ha
#align ennreal.tendsto_to_real ENNReal.tendsto_toReal
lemma continuousOn_toReal : ContinuousOn ENNReal.toReal { a | a ≠ ∞ } :=
NNReal.continuous_coe.comp_continuousOn continuousOn_toNNReal
lemma continuousAt_toReal (hx : x ≠ ∞) : ContinuousAt ENNReal.toReal x :=
continuousOn_toReal.continuousAt (isOpen_ne_top.mem_nhds_iff.mpr hx)
def neTopHomeomorphNNReal : { a | a ≠ ∞ } ≃ₜ ℝ≥0 where
toEquiv := neTopEquivNNReal
continuous_toFun := continuousOn_iff_continuous_restrict.1 continuousOn_toNNReal
continuous_invFun := continuous_coe.subtype_mk _
#align ennreal.ne_top_homeomorph_nnreal ENNReal.neTopHomeomorphNNReal
def ltTopHomeomorphNNReal : { a | a < ∞ } ≃ₜ ℝ≥0 := by
refine (Homeomorph.setCongr ?_).trans neTopHomeomorphNNReal
simp only [mem_setOf_eq, lt_top_iff_ne_top]
#align ennreal.lt_top_homeomorph_nnreal ENNReal.ltTopHomeomorphNNReal
theorem nhds_top : 𝓝 ∞ = ⨅ (a) (_ : a ≠ ∞), 𝓟 (Ioi a) :=
nhds_top_order.trans <| by simp [lt_top_iff_ne_top, Ioi]
#align ennreal.nhds_top ENNReal.nhds_top
theorem nhds_top' : 𝓝 ∞ = ⨅ r : ℝ≥0, 𝓟 (Ioi ↑r) :=
nhds_top.trans <| iInf_ne_top _
#align ennreal.nhds_top' ENNReal.nhds_top'
theorem nhds_top_basis : (𝓝 ∞).HasBasis (fun a => a < ∞) fun a => Ioi a :=
_root_.nhds_top_basis
#align ennreal.nhds_top_basis ENNReal.nhds_top_basis
theorem tendsto_nhds_top_iff_nnreal {m : α → ℝ≥0∞} {f : Filter α} :
Tendsto m f (𝓝 ∞) ↔ ∀ x : ℝ≥0, ∀ᶠ a in f, ↑x < m a := by
simp only [nhds_top', tendsto_iInf, tendsto_principal, mem_Ioi]
#align ennreal.tendsto_nhds_top_iff_nnreal ENNReal.tendsto_nhds_top_iff_nnreal
theorem tendsto_nhds_top_iff_nat {m : α → ℝ≥0∞} {f : Filter α} :
Tendsto m f (𝓝 ∞) ↔ ∀ n : ℕ, ∀ᶠ a in f, ↑n < m a :=
tendsto_nhds_top_iff_nnreal.trans
⟨fun h n => by simpa only [ENNReal.coe_natCast] using h n, fun h x =>
let ⟨n, hn⟩ := exists_nat_gt x
(h n).mono fun y => lt_trans <| by rwa [← ENNReal.coe_natCast, coe_lt_coe]⟩
#align ennreal.tendsto_nhds_top_iff_nat ENNReal.tendsto_nhds_top_iff_nat
theorem tendsto_nhds_top {m : α → ℝ≥0∞} {f : Filter α} (h : ∀ n : ℕ, ∀ᶠ a in f, ↑n < m a) :
Tendsto m f (𝓝 ∞) :=
tendsto_nhds_top_iff_nat.2 h
#align ennreal.tendsto_nhds_top ENNReal.tendsto_nhds_top
theorem tendsto_nat_nhds_top : Tendsto (fun n : ℕ => ↑n) atTop (𝓝 ∞) :=
tendsto_nhds_top fun n =>
mem_atTop_sets.2 ⟨n + 1, fun _m hm => mem_setOf.2 <| Nat.cast_lt.2 <| Nat.lt_of_succ_le hm⟩
#align ennreal.tendsto_nat_nhds_top ENNReal.tendsto_nat_nhds_top
@[simp, norm_cast]
theorem tendsto_coe_nhds_top {f : α → ℝ≥0} {l : Filter α} :
Tendsto (fun x => (f x : ℝ≥0∞)) l (𝓝 ∞) ↔ Tendsto f l atTop := by
rw [tendsto_nhds_top_iff_nnreal, atTop_basis_Ioi.tendsto_right_iff]; simp
#align ennreal.tendsto_coe_nhds_top ENNReal.tendsto_coe_nhds_top
theorem tendsto_ofReal_atTop : Tendsto ENNReal.ofReal atTop (𝓝 ∞) :=
tendsto_coe_nhds_top.2 tendsto_real_toNNReal_atTop
#align ennreal.tendsto_of_real_at_top ENNReal.tendsto_ofReal_atTop
theorem nhds_zero : 𝓝 (0 : ℝ≥0∞) = ⨅ (a) (_ : a ≠ 0), 𝓟 (Iio a) :=
nhds_bot_order.trans <| by simp [pos_iff_ne_zero, Iio]
#align ennreal.nhds_zero ENNReal.nhds_zero
theorem nhds_zero_basis : (𝓝 (0 : ℝ≥0∞)).HasBasis (fun a : ℝ≥0∞ => 0 < a) fun a => Iio a :=
nhds_bot_basis
#align ennreal.nhds_zero_basis ENNReal.nhds_zero_basis
theorem nhds_zero_basis_Iic : (𝓝 (0 : ℝ≥0∞)).HasBasis (fun a : ℝ≥0∞ => 0 < a) Iic :=
nhds_bot_basis_Iic
#align ennreal.nhds_zero_basis_Iic ENNReal.nhds_zero_basis_Iic
-- Porting note (#11215): TODO: add a TC for `≠ ∞`?
@[instance]
theorem nhdsWithin_Ioi_coe_neBot {r : ℝ≥0} : (𝓝[>] (r : ℝ≥0∞)).NeBot :=
nhdsWithin_Ioi_self_neBot' ⟨∞, ENNReal.coe_lt_top⟩
#align ennreal.nhds_within_Ioi_coe_ne_bot ENNReal.nhdsWithin_Ioi_coe_neBot
@[instance]
theorem nhdsWithin_Ioi_zero_neBot : (𝓝[>] (0 : ℝ≥0∞)).NeBot :=
nhdsWithin_Ioi_coe_neBot
#align ennreal.nhds_within_Ioi_zero_ne_bot ENNReal.nhdsWithin_Ioi_zero_neBot
@[instance]
theorem nhdsWithin_Ioi_one_neBot : (𝓝[>] (1 : ℝ≥0∞)).NeBot := nhdsWithin_Ioi_coe_neBot
@[instance]
theorem nhdsWithin_Ioi_nat_neBot (n : ℕ) : (𝓝[>] (n : ℝ≥0∞)).NeBot := nhdsWithin_Ioi_coe_neBot
@[instance]
theorem nhdsWithin_Ioi_ofNat_nebot (n : ℕ) [n.AtLeastTwo] :
(𝓝[>] (OfNat.ofNat n : ℝ≥0∞)).NeBot := nhdsWithin_Ioi_coe_neBot
@[instance]
theorem nhdsWithin_Iio_neBot [NeZero x] : (𝓝[<] x).NeBot :=
nhdsWithin_Iio_self_neBot' ⟨0, NeZero.pos x⟩
theorem hasBasis_nhds_of_ne_top' (xt : x ≠ ∞) :
(𝓝 x).HasBasis (· ≠ 0) (fun ε => Icc (x - ε) (x + ε)) := by
rcases (zero_le x).eq_or_gt with rfl | x0
· simp_rw [zero_tsub, zero_add, ← bot_eq_zero, Icc_bot, ← bot_lt_iff_ne_bot]
exact nhds_bot_basis_Iic
· refine (nhds_basis_Ioo' ⟨_, x0⟩ ⟨_, xt.lt_top⟩).to_hasBasis ?_ fun ε ε0 => ?_
· rintro ⟨a, b⟩ ⟨ha, hb⟩
rcases exists_between (tsub_pos_of_lt ha) with ⟨ε, ε0, hε⟩
rcases lt_iff_exists_add_pos_lt.1 hb with ⟨δ, δ0, hδ⟩
refine ⟨min ε δ, (lt_min ε0 (coe_pos.2 δ0)).ne', Icc_subset_Ioo ?_ ?_⟩
· exact lt_tsub_comm.2 ((min_le_left _ _).trans_lt hε)
· exact (add_le_add_left (min_le_right _ _) _).trans_lt hδ
· exact ⟨(x - ε, x + ε), ⟨ENNReal.sub_lt_self xt x0.ne' ε0,
lt_add_right xt ε0⟩, Ioo_subset_Icc_self⟩
theorem hasBasis_nhds_of_ne_top (xt : x ≠ ∞) :
(𝓝 x).HasBasis (0 < ·) (fun ε => Icc (x - ε) (x + ε)) := by
simpa only [pos_iff_ne_zero] using hasBasis_nhds_of_ne_top' xt
theorem Icc_mem_nhds (xt : x ≠ ∞) (ε0 : ε ≠ 0) : Icc (x - ε) (x + ε) ∈ 𝓝 x :=
(hasBasis_nhds_of_ne_top' xt).mem_of_mem ε0
#align ennreal.Icc_mem_nhds ENNReal.Icc_mem_nhds
theorem nhds_of_ne_top (xt : x ≠ ∞) : 𝓝 x = ⨅ ε > 0, 𝓟 (Icc (x - ε) (x + ε)) :=
(hasBasis_nhds_of_ne_top xt).eq_biInf
#align ennreal.nhds_of_ne_top ENNReal.nhds_of_ne_top
theorem biInf_le_nhds : ∀ x : ℝ≥0∞, ⨅ ε > 0, 𝓟 (Icc (x - ε) (x + ε)) ≤ 𝓝 x
| ∞ => iInf₂_le_of_le 1 one_pos <| by
simpa only [← coe_one, top_sub_coe, top_add, Icc_self, principal_singleton] using pure_le_nhds _
| (x : ℝ≥0) => (nhds_of_ne_top coe_ne_top).ge
-- Porting note (#10756): new lemma
protected theorem tendsto_nhds_of_Icc {f : Filter α} {u : α → ℝ≥0∞} {a : ℝ≥0∞}
(h : ∀ ε > 0, ∀ᶠ x in f, u x ∈ Icc (a - ε) (a + ε)) : Tendsto u f (𝓝 a) := by
refine Tendsto.mono_right ?_ (biInf_le_nhds _)
simpa only [tendsto_iInf, tendsto_principal]
protected theorem tendsto_nhds {f : Filter α} {u : α → ℝ≥0∞} {a : ℝ≥0∞} (ha : a ≠ ∞) :
Tendsto u f (𝓝 a) ↔ ∀ ε > 0, ∀ᶠ x in f, u x ∈ Icc (a - ε) (a + ε) := by
simp only [nhds_of_ne_top ha, tendsto_iInf, tendsto_principal]
#align ennreal.tendsto_nhds ENNReal.tendsto_nhds
protected theorem tendsto_nhds_zero {f : Filter α} {u : α → ℝ≥0∞} :
Tendsto u f (𝓝 0) ↔ ∀ ε > 0, ∀ᶠ x in f, u x ≤ ε :=
nhds_zero_basis_Iic.tendsto_right_iff
#align ennreal.tendsto_nhds_zero ENNReal.tendsto_nhds_zero
protected theorem tendsto_atTop [Nonempty β] [SemilatticeSup β] {f : β → ℝ≥0∞} {a : ℝ≥0∞}
(ha : a ≠ ∞) : Tendsto f atTop (𝓝 a) ↔ ∀ ε > 0, ∃ N, ∀ n ≥ N, f n ∈ Icc (a - ε) (a + ε) :=
.trans (atTop_basis.tendsto_iff (hasBasis_nhds_of_ne_top ha)) (by simp only [true_and]; rfl)
#align ennreal.tendsto_at_top ENNReal.tendsto_atTop
instance : ContinuousAdd ℝ≥0∞ := by
refine ⟨continuous_iff_continuousAt.2 ?_⟩
rintro ⟨_ | a, b⟩
· exact tendsto_nhds_top_mono' continuousAt_fst fun p => le_add_right le_rfl
rcases b with (_ | b)
· exact tendsto_nhds_top_mono' continuousAt_snd fun p => le_add_left le_rfl
simp only [ContinuousAt, some_eq_coe, nhds_coe_coe, ← coe_add, tendsto_map'_iff, (· ∘ ·),
tendsto_coe, tendsto_add]
protected theorem tendsto_atTop_zero [Nonempty β] [SemilatticeSup β] {f : β → ℝ≥0∞} :
Tendsto f atTop (𝓝 0) ↔ ∀ ε > 0, ∃ N, ∀ n ≥ N, f n ≤ ε :=
.trans (atTop_basis.tendsto_iff nhds_zero_basis_Iic) (by simp only [true_and]; rfl)
#align ennreal.tendsto_at_top_zero ENNReal.tendsto_atTop_zero
theorem tendsto_sub : ∀ {a b : ℝ≥0∞}, (a ≠ ∞ ∨ b ≠ ∞) →
Tendsto (fun p : ℝ≥0∞ × ℝ≥0∞ => p.1 - p.2) (𝓝 (a, b)) (𝓝 (a - b))
| ∞, ∞, h => by simp only [ne_eq, not_true_eq_false, or_self] at h
| ∞, (b : ℝ≥0), _ => by
rw [top_sub_coe, tendsto_nhds_top_iff_nnreal]
refine fun x => ((lt_mem_nhds <| @coe_lt_top (b + 1 + x)).prod_nhds
(ge_mem_nhds <| coe_lt_coe.2 <| lt_add_one b)).mono fun y hy => ?_
rw [lt_tsub_iff_left]
calc y.2 + x ≤ ↑(b + 1) + x := add_le_add_right hy.2 _
_ < y.1 := hy.1
| (a : ℝ≥0), ∞, _ => by
rw [sub_top]
refine (tendsto_pure.2 ?_).mono_right (pure_le_nhds _)
exact ((gt_mem_nhds <| coe_lt_coe.2 <| lt_add_one a).prod_nhds
(lt_mem_nhds <| @coe_lt_top (a + 1))).mono fun x hx =>
tsub_eq_zero_iff_le.2 (hx.1.trans hx.2).le
| (a : ℝ≥0), (b : ℝ≥0), _ => by
simp only [nhds_coe_coe, tendsto_map'_iff, ← ENNReal.coe_sub, (· ∘ ·), tendsto_coe]
exact continuous_sub.tendsto (a, b)
#align ennreal.tendsto_sub ENNReal.tendsto_sub
protected theorem Tendsto.sub {f : Filter α} {ma : α → ℝ≥0∞} {mb : α → ℝ≥0∞} {a b : ℝ≥0∞}
(hma : Tendsto ma f (𝓝 a)) (hmb : Tendsto mb f (𝓝 b)) (h : a ≠ ∞ ∨ b ≠ ∞) :
Tendsto (fun a => ma a - mb a) f (𝓝 (a - b)) :=
show Tendsto ((fun p : ℝ≥0∞ × ℝ≥0∞ => p.1 - p.2) ∘ fun a => (ma a, mb a)) f (𝓝 (a - b)) from
Tendsto.comp (ENNReal.tendsto_sub h) (hma.prod_mk_nhds hmb)
#align ennreal.tendsto.sub ENNReal.Tendsto.sub
protected theorem tendsto_mul (ha : a ≠ 0 ∨ b ≠ ∞) (hb : b ≠ 0 ∨ a ≠ ∞) :
Tendsto (fun p : ℝ≥0∞ × ℝ≥0∞ => p.1 * p.2) (𝓝 (a, b)) (𝓝 (a * b)) := by
have ht : ∀ b : ℝ≥0∞, b ≠ 0 →
Tendsto (fun p : ℝ≥0∞ × ℝ≥0∞ => p.1 * p.2) (𝓝 (∞, b)) (𝓝 ∞) := fun b hb => by
refine tendsto_nhds_top_iff_nnreal.2 fun n => ?_
rcases lt_iff_exists_nnreal_btwn.1 (pos_iff_ne_zero.2 hb) with ⟨ε, hε, hεb⟩
have : ∀ᶠ c : ℝ≥0∞ × ℝ≥0∞ in 𝓝 (∞, b), ↑n / ↑ε < c.1 ∧ ↑ε < c.2 :=
(lt_mem_nhds <| div_lt_top coe_ne_top hε.ne').prod_nhds (lt_mem_nhds hεb)
refine this.mono fun c hc => ?_
exact (ENNReal.div_mul_cancel hε.ne' coe_ne_top).symm.trans_lt (mul_lt_mul hc.1 hc.2)
induction a with
| top => simp only [ne_eq, or_false, not_true_eq_false] at hb; simp [ht b hb, top_mul hb]
| coe a =>
induction b with
| top =>
simp only [ne_eq, or_false, not_true_eq_false] at ha
simpa [(· ∘ ·), mul_comm, mul_top ha]
using (ht a ha).comp (continuous_swap.tendsto (ofNNReal a, ∞))
| coe b =>
simp only [nhds_coe_coe, ← coe_mul, tendsto_coe, tendsto_map'_iff, (· ∘ ·), tendsto_mul]
#align ennreal.tendsto_mul ENNReal.tendsto_mul
protected theorem Tendsto.mul {f : Filter α} {ma : α → ℝ≥0∞} {mb : α → ℝ≥0∞} {a b : ℝ≥0∞}
(hma : Tendsto ma f (𝓝 a)) (ha : a ≠ 0 ∨ b ≠ ∞) (hmb : Tendsto mb f (𝓝 b))
(hb : b ≠ 0 ∨ a ≠ ∞) : Tendsto (fun a => ma a * mb a) f (𝓝 (a * b)) :=
show Tendsto ((fun p : ℝ≥0∞ × ℝ≥0∞ => p.1 * p.2) ∘ fun a => (ma a, mb a)) f (𝓝 (a * b)) from
Tendsto.comp (ENNReal.tendsto_mul ha hb) (hma.prod_mk_nhds hmb)
#align ennreal.tendsto.mul ENNReal.Tendsto.mul
theorem _root_.ContinuousOn.ennreal_mul [TopologicalSpace α] {f g : α → ℝ≥0∞} {s : Set α}
(hf : ContinuousOn f s) (hg : ContinuousOn g s) (h₁ : ∀ x ∈ s, f x ≠ 0 ∨ g x ≠ ∞)
(h₂ : ∀ x ∈ s, g x ≠ 0 ∨ f x ≠ ∞) : ContinuousOn (fun x => f x * g x) s := fun x hx =>
ENNReal.Tendsto.mul (hf x hx) (h₁ x hx) (hg x hx) (h₂ x hx)
#align continuous_on.ennreal_mul ContinuousOn.ennreal_mul
theorem _root_.Continuous.ennreal_mul [TopologicalSpace α] {f g : α → ℝ≥0∞} (hf : Continuous f)
(hg : Continuous g) (h₁ : ∀ x, f x ≠ 0 ∨ g x ≠ ∞) (h₂ : ∀ x, g x ≠ 0 ∨ f x ≠ ∞) :
Continuous fun x => f x * g x :=
continuous_iff_continuousAt.2 fun x =>
ENNReal.Tendsto.mul hf.continuousAt (h₁ x) hg.continuousAt (h₂ x)
#align continuous.ennreal_mul Continuous.ennreal_mul
protected theorem Tendsto.const_mul {f : Filter α} {m : α → ℝ≥0∞} {a b : ℝ≥0∞}
(hm : Tendsto m f (𝓝 b)) (hb : b ≠ 0 ∨ a ≠ ∞) : Tendsto (fun b => a * m b) f (𝓝 (a * b)) :=
by_cases (fun (this : a = 0) => by simp [this, tendsto_const_nhds]) fun ha : a ≠ 0 =>
ENNReal.Tendsto.mul tendsto_const_nhds (Or.inl ha) hm hb
#align ennreal.tendsto.const_mul ENNReal.Tendsto.const_mul
protected theorem Tendsto.mul_const {f : Filter α} {m : α → ℝ≥0∞} {a b : ℝ≥0∞}
(hm : Tendsto m f (𝓝 a)) (ha : a ≠ 0 ∨ b ≠ ∞) : Tendsto (fun x => m x * b) f (𝓝 (a * b)) := by
simpa only [mul_comm] using ENNReal.Tendsto.const_mul hm ha
#align ennreal.tendsto.mul_const ENNReal.Tendsto.mul_const
theorem tendsto_finset_prod_of_ne_top {ι : Type*} {f : ι → α → ℝ≥0∞} {x : Filter α} {a : ι → ℝ≥0∞}
(s : Finset ι) (h : ∀ i ∈ s, Tendsto (f i) x (𝓝 (a i))) (h' : ∀ i ∈ s, a i ≠ ∞) :
Tendsto (fun b => ∏ c ∈ s, f c b) x (𝓝 (∏ c ∈ s, a c)) := by
induction' s using Finset.induction with a s has IH
· simp [tendsto_const_nhds]
simp only [Finset.prod_insert has]
apply Tendsto.mul (h _ (Finset.mem_insert_self _ _))
· right
exact (prod_lt_top fun i hi => h' _ (Finset.mem_insert_of_mem hi)).ne
· exact IH (fun i hi => h _ (Finset.mem_insert_of_mem hi)) fun i hi =>
h' _ (Finset.mem_insert_of_mem hi)
· exact Or.inr (h' _ (Finset.mem_insert_self _ _))
#align ennreal.tendsto_finset_prod_of_ne_top ENNReal.tendsto_finset_prod_of_ne_top
protected theorem continuousAt_const_mul {a b : ℝ≥0∞} (h : a ≠ ∞ ∨ b ≠ 0) :
ContinuousAt (a * ·) b :=
Tendsto.const_mul tendsto_id h.symm
#align ennreal.continuous_at_const_mul ENNReal.continuousAt_const_mul
protected theorem continuousAt_mul_const {a b : ℝ≥0∞} (h : a ≠ ∞ ∨ b ≠ 0) :
ContinuousAt (fun x => x * a) b :=
Tendsto.mul_const tendsto_id h.symm
#align ennreal.continuous_at_mul_const ENNReal.continuousAt_mul_const
protected theorem continuous_const_mul {a : ℝ≥0∞} (ha : a ≠ ∞) : Continuous (a * ·) :=
continuous_iff_continuousAt.2 fun _ => ENNReal.continuousAt_const_mul (Or.inl ha)
#align ennreal.continuous_const_mul ENNReal.continuous_const_mul
protected theorem continuous_mul_const {a : ℝ≥0∞} (ha : a ≠ ∞) : Continuous fun x => x * a :=
continuous_iff_continuousAt.2 fun _ => ENNReal.continuousAt_mul_const (Or.inl ha)
#align ennreal.continuous_mul_const ENNReal.continuous_mul_const
protected theorem continuous_div_const (c : ℝ≥0∞) (c_ne_zero : c ≠ 0) :
Continuous fun x : ℝ≥0∞ => x / c := by
simp_rw [div_eq_mul_inv, continuous_iff_continuousAt]
intro x
exact ENNReal.continuousAt_mul_const (Or.intro_left _ (inv_ne_top.mpr c_ne_zero))
#align ennreal.continuous_div_const ENNReal.continuous_div_const
@[continuity]
theorem continuous_pow (n : ℕ) : Continuous fun a : ℝ≥0∞ => a ^ n := by
induction' n with n IH
· simp [continuous_const]
simp_rw [pow_add, pow_one, continuous_iff_continuousAt]
intro x
refine ENNReal.Tendsto.mul (IH.tendsto _) ?_ tendsto_id ?_ <;> by_cases H : x = 0
· simp only [H, zero_ne_top, Ne, or_true_iff, not_false_iff]
· exact Or.inl fun h => H (pow_eq_zero h)
· simp only [H, pow_eq_top_iff, zero_ne_top, false_or_iff, eq_self_iff_true, not_true, Ne,
not_false_iff, false_and_iff]
· simp only [H, true_or_iff, Ne, not_false_iff]
#align ennreal.continuous_pow ENNReal.continuous_pow
theorem continuousOn_sub :
ContinuousOn (fun p : ℝ≥0∞ × ℝ≥0∞ => p.fst - p.snd) { p : ℝ≥0∞ × ℝ≥0∞ | p ≠ ⟨∞, ∞⟩ } := by
rw [ContinuousOn]
rintro ⟨x, y⟩ hp
simp only [Ne, Set.mem_setOf_eq, Prod.mk.inj_iff] at hp
exact tendsto_nhdsWithin_of_tendsto_nhds (tendsto_sub (not_and_or.mp hp))
#align ennreal.continuous_on_sub ENNReal.continuousOn_sub
theorem continuous_sub_left {a : ℝ≥0∞} (a_ne_top : a ≠ ∞) : Continuous (a - ·) := by
change Continuous (Function.uncurry Sub.sub ∘ (a, ·))
refine continuousOn_sub.comp_continuous (Continuous.Prod.mk a) fun x => ?_
simp only [a_ne_top, Ne, mem_setOf_eq, Prod.mk.inj_iff, false_and_iff, not_false_iff]
#align ennreal.continuous_sub_left ENNReal.continuous_sub_left
theorem continuous_nnreal_sub {a : ℝ≥0} : Continuous fun x : ℝ≥0∞ => (a : ℝ≥0∞) - x :=
continuous_sub_left coe_ne_top
#align ennreal.continuous_nnreal_sub ENNReal.continuous_nnreal_sub
theorem continuousOn_sub_left (a : ℝ≥0∞) : ContinuousOn (a - ·) { x : ℝ≥0∞ | x ≠ ∞ } := by
rw [show (fun x => a - x) = (fun p : ℝ≥0∞ × ℝ≥0∞ => p.fst - p.snd) ∘ fun x => ⟨a, x⟩ by rfl]
apply ContinuousOn.comp continuousOn_sub (Continuous.continuousOn (Continuous.Prod.mk a))
rintro _ h (_ | _)
exact h none_eq_top
#align ennreal.continuous_on_sub_left ENNReal.continuousOn_sub_left
theorem continuous_sub_right (a : ℝ≥0∞) : Continuous fun x : ℝ≥0∞ => x - a := by
by_cases a_infty : a = ∞
· simp [a_infty, continuous_const]
· rw [show (fun x => x - a) = (fun p : ℝ≥0∞ × ℝ≥0∞ => p.fst - p.snd) ∘ fun x => ⟨x, a⟩ by rfl]
apply ContinuousOn.comp_continuous continuousOn_sub (continuous_id'.prod_mk continuous_const)
intro x
simp only [a_infty, Ne, mem_setOf_eq, Prod.mk.inj_iff, and_false_iff, not_false_iff]
#align ennreal.continuous_sub_right ENNReal.continuous_sub_right
protected theorem Tendsto.pow {f : Filter α} {m : α → ℝ≥0∞} {a : ℝ≥0∞} {n : ℕ}
(hm : Tendsto m f (𝓝 a)) : Tendsto (fun x => m x ^ n) f (𝓝 (a ^ n)) :=
((continuous_pow n).tendsto a).comp hm
#align ennreal.tendsto.pow ENNReal.Tendsto.pow
theorem le_of_forall_lt_one_mul_le {x y : ℝ≥0∞} (h : ∀ a < 1, a * x ≤ y) : x ≤ y := by
have : Tendsto (· * x) (𝓝[<] 1) (𝓝 (1 * x)) :=
(ENNReal.continuousAt_mul_const (Or.inr one_ne_zero)).mono_left inf_le_left
rw [one_mul] at this
exact le_of_tendsto this (eventually_nhdsWithin_iff.2 <| eventually_of_forall h)
#align ennreal.le_of_forall_lt_one_mul_le ENNReal.le_of_forall_lt_one_mul_le
theorem iInf_mul_left' {ι} {f : ι → ℝ≥0∞} {a : ℝ≥0∞} (h : a = ∞ → ⨅ i, f i = 0 → ∃ i, f i = 0)
(h0 : a = 0 → Nonempty ι) : ⨅ i, a * f i = a * ⨅ i, f i := by
by_cases H : a = ∞ ∧ ⨅ i, f i = 0
· rcases h H.1 H.2 with ⟨i, hi⟩
rw [H.2, mul_zero, ← bot_eq_zero, iInf_eq_bot]
exact fun b hb => ⟨i, by rwa [hi, mul_zero, ← bot_eq_zero]⟩
· rw [not_and_or] at H
cases isEmpty_or_nonempty ι
· rw [iInf_of_empty, iInf_of_empty, mul_top]
exact mt h0 (not_nonempty_iff.2 ‹_›)
· exact (ENNReal.mul_left_mono.map_iInf_of_continuousAt'
(ENNReal.continuousAt_const_mul H)).symm
#align ennreal.infi_mul_left' ENNReal.iInf_mul_left'
theorem iInf_mul_left {ι} [Nonempty ι] {f : ι → ℝ≥0∞} {a : ℝ≥0∞}
(h : a = ∞ → ⨅ i, f i = 0 → ∃ i, f i = 0) : ⨅ i, a * f i = a * ⨅ i, f i :=
iInf_mul_left' h fun _ => ‹Nonempty ι›
#align ennreal.infi_mul_left ENNReal.iInf_mul_left
theorem iInf_mul_right' {ι} {f : ι → ℝ≥0∞} {a : ℝ≥0∞} (h : a = ∞ → ⨅ i, f i = 0 → ∃ i, f i = 0)
(h0 : a = 0 → Nonempty ι) : ⨅ i, f i * a = (⨅ i, f i) * a := by
simpa only [mul_comm a] using iInf_mul_left' h h0
#align ennreal.infi_mul_right' ENNReal.iInf_mul_right'
theorem iInf_mul_right {ι} [Nonempty ι] {f : ι → ℝ≥0∞} {a : ℝ≥0∞}
(h : a = ∞ → ⨅ i, f i = 0 → ∃ i, f i = 0) : ⨅ i, f i * a = (⨅ i, f i) * a :=
iInf_mul_right' h fun _ => ‹Nonempty ι›
#align ennreal.infi_mul_right ENNReal.iInf_mul_right
theorem inv_map_iInf {ι : Sort*} {x : ι → ℝ≥0∞} : (iInf x)⁻¹ = ⨆ i, (x i)⁻¹ :=
OrderIso.invENNReal.map_iInf x
#align ennreal.inv_map_infi ENNReal.inv_map_iInf
theorem inv_map_iSup {ι : Sort*} {x : ι → ℝ≥0∞} : (iSup x)⁻¹ = ⨅ i, (x i)⁻¹ :=
OrderIso.invENNReal.map_iSup x
#align ennreal.inv_map_supr ENNReal.inv_map_iSup
theorem inv_limsup {ι : Sort _} {x : ι → ℝ≥0∞} {l : Filter ι} :
(limsup x l)⁻¹ = liminf (fun i => (x i)⁻¹) l :=
OrderIso.invENNReal.limsup_apply
#align ennreal.inv_limsup ENNReal.inv_limsup
theorem inv_liminf {ι : Sort _} {x : ι → ℝ≥0∞} {l : Filter ι} :
(liminf x l)⁻¹ = limsup (fun i => (x i)⁻¹) l :=
OrderIso.invENNReal.liminf_apply
#align ennreal.inv_liminf ENNReal.inv_liminf
instance : ContinuousInv ℝ≥0∞ := ⟨OrderIso.invENNReal.continuous⟩
@[simp] -- Porting note (#11215): TODO: generalize to `[InvolutiveInv _] [ContinuousInv _]`
protected theorem tendsto_inv_iff {f : Filter α} {m : α → ℝ≥0∞} {a : ℝ≥0∞} :
Tendsto (fun x => (m x)⁻¹) f (𝓝 a⁻¹) ↔ Tendsto m f (𝓝 a) :=
⟨fun h => by simpa only [inv_inv] using Tendsto.inv h, Tendsto.inv⟩
#align ennreal.tendsto_inv_iff ENNReal.tendsto_inv_iff
protected theorem Tendsto.div {f : Filter α} {ma : α → ℝ≥0∞} {mb : α → ℝ≥0∞} {a b : ℝ≥0∞}
(hma : Tendsto ma f (𝓝 a)) (ha : a ≠ 0 ∨ b ≠ 0) (hmb : Tendsto mb f (𝓝 b))
(hb : b ≠ ∞ ∨ a ≠ ∞) : Tendsto (fun a => ma a / mb a) f (𝓝 (a / b)) := by
apply Tendsto.mul hma _ (ENNReal.tendsto_inv_iff.2 hmb) _ <;> simp [ha, hb]
#align ennreal.tendsto.div ENNReal.Tendsto.div
protected theorem Tendsto.const_div {f : Filter α} {m : α → ℝ≥0∞} {a b : ℝ≥0∞}
(hm : Tendsto m f (𝓝 b)) (hb : b ≠ ∞ ∨ a ≠ ∞) : Tendsto (fun b => a / m b) f (𝓝 (a / b)) := by
apply Tendsto.const_mul (ENNReal.tendsto_inv_iff.2 hm)
simp [hb]
#align ennreal.tendsto.const_div ENNReal.Tendsto.const_div
protected theorem Tendsto.div_const {f : Filter α} {m : α → ℝ≥0∞} {a b : ℝ≥0∞}
(hm : Tendsto m f (𝓝 a)) (ha : a ≠ 0 ∨ b ≠ 0) : Tendsto (fun x => m x / b) f (𝓝 (a / b)) := by
apply Tendsto.mul_const hm
simp [ha]
#align ennreal.tendsto.div_const ENNReal.Tendsto.div_const
protected theorem tendsto_inv_nat_nhds_zero : Tendsto (fun n : ℕ => (n : ℝ≥0∞)⁻¹) atTop (𝓝 0) :=
ENNReal.inv_top ▸ ENNReal.tendsto_inv_iff.2 tendsto_nat_nhds_top
#align ennreal.tendsto_inv_nat_nhds_zero ENNReal.tendsto_inv_nat_nhds_zero
theorem iSup_add {ι : Sort*} {s : ι → ℝ≥0∞} [Nonempty ι] : iSup s + a = ⨆ b, s b + a :=
Monotone.map_iSup_of_continuousAt' (continuousAt_id.add continuousAt_const) <|
monotone_id.add monotone_const
#align ennreal.supr_add ENNReal.iSup_add
theorem biSup_add' {ι : Sort*} {p : ι → Prop} (h : ∃ i, p i) {f : ι → ℝ≥0∞} :
(⨆ (i) (_ : p i), f i) + a = ⨆ (i) (_ : p i), f i + a := by
haveI : Nonempty { i // p i } := nonempty_subtype.2 h
simp only [iSup_subtype', iSup_add]
#align ennreal.bsupr_add' ENNReal.biSup_add'
theorem add_biSup' {ι : Sort*} {p : ι → Prop} (h : ∃ i, p i) {f : ι → ℝ≥0∞} :
(a + ⨆ (i) (_ : p i), f i) = ⨆ (i) (_ : p i), a + f i := by
simp only [add_comm a, biSup_add' h]
#align ennreal.add_bsupr' ENNReal.add_biSup'
theorem biSup_add {ι} {s : Set ι} (hs : s.Nonempty) {f : ι → ℝ≥0∞} :
(⨆ i ∈ s, f i) + a = ⨆ i ∈ s, f i + a :=
biSup_add' hs
#align ennreal.bsupr_add ENNReal.biSup_add
theorem add_biSup {ι} {s : Set ι} (hs : s.Nonempty) {f : ι → ℝ≥0∞} :
(a + ⨆ i ∈ s, f i) = ⨆ i ∈ s, a + f i :=
add_biSup' hs
#align ennreal.add_bsupr ENNReal.add_biSup
theorem sSup_add {s : Set ℝ≥0∞} (hs : s.Nonempty) : sSup s + a = ⨆ b ∈ s, b + a := by
rw [sSup_eq_iSup, biSup_add hs]
#align ennreal.Sup_add ENNReal.sSup_add
theorem add_iSup {ι : Sort*} {s : ι → ℝ≥0∞} [Nonempty ι] : a + iSup s = ⨆ b, a + s b := by
rw [add_comm, iSup_add]; simp [add_comm]
#align ennreal.add_supr ENNReal.add_iSup
theorem iSup_add_iSup_le {ι ι' : Sort*} [Nonempty ι] [Nonempty ι'] {f : ι → ℝ≥0∞} {g : ι' → ℝ≥0∞}
{a : ℝ≥0∞} (h : ∀ i j, f i + g j ≤ a) : iSup f + iSup g ≤ a := by
simp_rw [iSup_add, add_iSup]; exact iSup₂_le h
#align ennreal.supr_add_supr_le ENNReal.iSup_add_iSup_le
| Mathlib/Topology/Instances/ENNReal.lean | 608 | 612 | theorem biSup_add_biSup_le' {ι ι'} {p : ι → Prop} {q : ι' → Prop} (hp : ∃ i, p i) (hq : ∃ j, q j)
{f : ι → ℝ≥0∞} {g : ι' → ℝ≥0∞} {a : ℝ≥0∞} (h : ∀ i, p i → ∀ j, q j → f i + g j ≤ a) :
((⨆ (i) (_ : p i), f i) + ⨆ (j) (_ : q j), g j) ≤ a := by |
simp_rw [biSup_add' hp, add_biSup' hq]
exact iSup₂_le fun i hi => iSup₂_le (h i hi)
|
import Mathlib.Algebra.Field.Basic
import Mathlib.Algebra.GroupWithZero.Units.Equiv
import Mathlib.Algebra.Order.Field.Defs
import Mathlib.Algebra.Order.Ring.Abs
import Mathlib.Order.Bounds.OrderIso
import Mathlib.Tactic.Positivity.Core
#align_import algebra.order.field.basic from "leanprover-community/mathlib"@"84771a9f5f0bd5e5d6218811556508ddf476dcbd"
open Function OrderDual
variable {ι α β : Type*}
section LinearOrderedSemifield
variable [LinearOrderedSemifield α] {a b c d e : α} {m n : ℤ}
@[simps! (config := { simpRhs := true })]
def OrderIso.mulLeft₀ (a : α) (ha : 0 < a) : α ≃o α :=
{ Equiv.mulLeft₀ a ha.ne' with map_rel_iff' := @fun _ _ => mul_le_mul_left ha }
#align order_iso.mul_left₀ OrderIso.mulLeft₀
#align order_iso.mul_left₀_symm_apply OrderIso.mulLeft₀_symm_apply
#align order_iso.mul_left₀_apply OrderIso.mulLeft₀_apply
@[simps! (config := { simpRhs := true })]
def OrderIso.mulRight₀ (a : α) (ha : 0 < a) : α ≃o α :=
{ Equiv.mulRight₀ a ha.ne' with map_rel_iff' := @fun _ _ => mul_le_mul_right ha }
#align order_iso.mul_right₀ OrderIso.mulRight₀
#align order_iso.mul_right₀_symm_apply OrderIso.mulRight₀_symm_apply
#align order_iso.mul_right₀_apply OrderIso.mulRight₀_apply
theorem le_div_iff (hc : 0 < c) : a ≤ b / c ↔ a * c ≤ b :=
⟨fun h => div_mul_cancel₀ b (ne_of_lt hc).symm ▸ mul_le_mul_of_nonneg_right h hc.le, fun h =>
calc
a = a * c * (1 / c) := mul_mul_div a (ne_of_lt hc).symm
_ ≤ b * (1 / c) := mul_le_mul_of_nonneg_right h (one_div_pos.2 hc).le
_ = b / c := (div_eq_mul_one_div b c).symm
⟩
#align le_div_iff le_div_iff
theorem le_div_iff' (hc : 0 < c) : a ≤ b / c ↔ c * a ≤ b := by rw [mul_comm, le_div_iff hc]
#align le_div_iff' le_div_iff'
theorem div_le_iff (hb : 0 < b) : a / b ≤ c ↔ a ≤ c * b :=
⟨fun h =>
calc
a = a / b * b := by rw [div_mul_cancel₀ _ (ne_of_lt hb).symm]
_ ≤ c * b := mul_le_mul_of_nonneg_right h hb.le
,
fun h =>
calc
a / b = a * (1 / b) := div_eq_mul_one_div a b
_ ≤ c * b * (1 / b) := mul_le_mul_of_nonneg_right h (one_div_pos.2 hb).le
_ = c * b / b := (div_eq_mul_one_div (c * b) b).symm
_ = c := by refine (div_eq_iff (ne_of_gt hb)).mpr rfl
⟩
#align div_le_iff div_le_iff
theorem div_le_iff' (hb : 0 < b) : a / b ≤ c ↔ a ≤ b * c := by rw [mul_comm, div_le_iff hb]
#align div_le_iff' div_le_iff'
lemma div_le_comm₀ (hb : 0 < b) (hc : 0 < c) : a / b ≤ c ↔ a / c ≤ b := by
rw [div_le_iff hb, div_le_iff' hc]
theorem lt_div_iff (hc : 0 < c) : a < b / c ↔ a * c < b :=
lt_iff_lt_of_le_iff_le <| div_le_iff hc
#align lt_div_iff lt_div_iff
theorem lt_div_iff' (hc : 0 < c) : a < b / c ↔ c * a < b := by rw [mul_comm, lt_div_iff hc]
#align lt_div_iff' lt_div_iff'
theorem div_lt_iff (hc : 0 < c) : b / c < a ↔ b < a * c :=
lt_iff_lt_of_le_iff_le (le_div_iff hc)
#align div_lt_iff div_lt_iff
theorem div_lt_iff' (hc : 0 < c) : b / c < a ↔ b < c * a := by rw [mul_comm, div_lt_iff hc]
#align div_lt_iff' div_lt_iff'
lemma div_lt_comm₀ (hb : 0 < b) (hc : 0 < c) : a / b < c ↔ a / c < b := by
rw [div_lt_iff hb, div_lt_iff' hc]
theorem inv_mul_le_iff (h : 0 < b) : b⁻¹ * a ≤ c ↔ a ≤ b * c := by
rw [inv_eq_one_div, mul_comm, ← div_eq_mul_one_div]
exact div_le_iff' h
#align inv_mul_le_iff inv_mul_le_iff
theorem inv_mul_le_iff' (h : 0 < b) : b⁻¹ * a ≤ c ↔ a ≤ c * b := by rw [inv_mul_le_iff h, mul_comm]
#align inv_mul_le_iff' inv_mul_le_iff'
theorem mul_inv_le_iff (h : 0 < b) : a * b⁻¹ ≤ c ↔ a ≤ b * c := by rw [mul_comm, inv_mul_le_iff h]
#align mul_inv_le_iff mul_inv_le_iff
theorem mul_inv_le_iff' (h : 0 < b) : a * b⁻¹ ≤ c ↔ a ≤ c * b := by rw [mul_comm, inv_mul_le_iff' h]
#align mul_inv_le_iff' mul_inv_le_iff'
theorem div_self_le_one (a : α) : a / a ≤ 1 :=
if h : a = 0 then by simp [h] else by simp [h]
#align div_self_le_one div_self_le_one
theorem inv_mul_lt_iff (h : 0 < b) : b⁻¹ * a < c ↔ a < b * c := by
rw [inv_eq_one_div, mul_comm, ← div_eq_mul_one_div]
exact div_lt_iff' h
#align inv_mul_lt_iff inv_mul_lt_iff
theorem inv_mul_lt_iff' (h : 0 < b) : b⁻¹ * a < c ↔ a < c * b := by rw [inv_mul_lt_iff h, mul_comm]
#align inv_mul_lt_iff' inv_mul_lt_iff'
theorem mul_inv_lt_iff (h : 0 < b) : a * b⁻¹ < c ↔ a < b * c := by rw [mul_comm, inv_mul_lt_iff h]
#align mul_inv_lt_iff mul_inv_lt_iff
theorem mul_inv_lt_iff' (h : 0 < b) : a * b⁻¹ < c ↔ a < c * b := by rw [mul_comm, inv_mul_lt_iff' h]
#align mul_inv_lt_iff' mul_inv_lt_iff'
theorem inv_pos_le_iff_one_le_mul (ha : 0 < a) : a⁻¹ ≤ b ↔ 1 ≤ b * a := by
rw [inv_eq_one_div]
exact div_le_iff ha
#align inv_pos_le_iff_one_le_mul inv_pos_le_iff_one_le_mul
theorem inv_pos_le_iff_one_le_mul' (ha : 0 < a) : a⁻¹ ≤ b ↔ 1 ≤ a * b := by
rw [inv_eq_one_div]
exact div_le_iff' ha
#align inv_pos_le_iff_one_le_mul' inv_pos_le_iff_one_le_mul'
theorem inv_pos_lt_iff_one_lt_mul (ha : 0 < a) : a⁻¹ < b ↔ 1 < b * a := by
rw [inv_eq_one_div]
exact div_lt_iff ha
#align inv_pos_lt_iff_one_lt_mul inv_pos_lt_iff_one_lt_mul
theorem inv_pos_lt_iff_one_lt_mul' (ha : 0 < a) : a⁻¹ < b ↔ 1 < a * b := by
rw [inv_eq_one_div]
exact div_lt_iff' ha
#align inv_pos_lt_iff_one_lt_mul' inv_pos_lt_iff_one_lt_mul'
theorem div_le_of_nonneg_of_le_mul (hb : 0 ≤ b) (hc : 0 ≤ c) (h : a ≤ c * b) : a / b ≤ c := by
rcases eq_or_lt_of_le hb with (rfl | hb')
· simp only [div_zero, hc]
· rwa [div_le_iff hb']
#align div_le_of_nonneg_of_le_mul div_le_of_nonneg_of_le_mul
lemma mul_le_of_nonneg_of_le_div (hb : 0 ≤ b) (hc : 0 ≤ c) (h : a ≤ b / c) : a * c ≤ b := by
obtain rfl | hc := hc.eq_or_lt
· simpa using hb
· rwa [le_div_iff hc] at h
#align mul_le_of_nonneg_of_le_div mul_le_of_nonneg_of_le_div
theorem div_le_one_of_le (h : a ≤ b) (hb : 0 ≤ b) : a / b ≤ 1 :=
div_le_of_nonneg_of_le_mul hb zero_le_one <| by rwa [one_mul]
#align div_le_one_of_le div_le_one_of_le
lemma mul_inv_le_one_of_le (h : a ≤ b) (hb : 0 ≤ b) : a * b⁻¹ ≤ 1 := by
simpa only [← div_eq_mul_inv] using div_le_one_of_le h hb
lemma inv_mul_le_one_of_le (h : a ≤ b) (hb : 0 ≤ b) : b⁻¹ * a ≤ 1 := by
simpa only [← div_eq_inv_mul] using div_le_one_of_le h hb
@[gcongr]
theorem inv_le_inv_of_le (ha : 0 < a) (h : a ≤ b) : b⁻¹ ≤ a⁻¹ := by
rwa [← one_div a, le_div_iff' ha, ← div_eq_mul_inv, div_le_iff (ha.trans_le h), one_mul]
#align inv_le_inv_of_le inv_le_inv_of_le
theorem inv_le_inv (ha : 0 < a) (hb : 0 < b) : a⁻¹ ≤ b⁻¹ ↔ b ≤ a := by
rw [← one_div, div_le_iff ha, ← div_eq_inv_mul, le_div_iff hb, one_mul]
#align inv_le_inv inv_le_inv
theorem inv_le (ha : 0 < a) (hb : 0 < b) : a⁻¹ ≤ b ↔ b⁻¹ ≤ a := by
rw [← inv_le_inv hb (inv_pos.2 ha), inv_inv]
#align inv_le inv_le
theorem inv_le_of_inv_le (ha : 0 < a) (h : a⁻¹ ≤ b) : b⁻¹ ≤ a :=
(inv_le ha ((inv_pos.2 ha).trans_le h)).1 h
#align inv_le_of_inv_le inv_le_of_inv_le
theorem le_inv (ha : 0 < a) (hb : 0 < b) : a ≤ b⁻¹ ↔ b ≤ a⁻¹ := by
rw [← inv_le_inv (inv_pos.2 hb) ha, inv_inv]
#align le_inv le_inv
theorem inv_lt_inv (ha : 0 < a) (hb : 0 < b) : a⁻¹ < b⁻¹ ↔ b < a :=
lt_iff_lt_of_le_iff_le (inv_le_inv hb ha)
#align inv_lt_inv inv_lt_inv
@[gcongr]
theorem inv_lt_inv_of_lt (hb : 0 < b) (h : b < a) : a⁻¹ < b⁻¹ :=
(inv_lt_inv (hb.trans h) hb).2 h
#align inv_lt_inv_of_lt inv_lt_inv_of_lt
theorem inv_lt (ha : 0 < a) (hb : 0 < b) : a⁻¹ < b ↔ b⁻¹ < a :=
lt_iff_lt_of_le_iff_le (le_inv hb ha)
#align inv_lt inv_lt
theorem inv_lt_of_inv_lt (ha : 0 < a) (h : a⁻¹ < b) : b⁻¹ < a :=
(inv_lt ha ((inv_pos.2 ha).trans h)).1 h
#align inv_lt_of_inv_lt inv_lt_of_inv_lt
theorem lt_inv (ha : 0 < a) (hb : 0 < b) : a < b⁻¹ ↔ b < a⁻¹ :=
lt_iff_lt_of_le_iff_le (inv_le hb ha)
#align lt_inv lt_inv
theorem inv_lt_one (ha : 1 < a) : a⁻¹ < 1 := by
rwa [inv_lt (zero_lt_one.trans ha) zero_lt_one, inv_one]
#align inv_lt_one inv_lt_one
theorem one_lt_inv (h₁ : 0 < a) (h₂ : a < 1) : 1 < a⁻¹ := by
rwa [lt_inv (@zero_lt_one α _ _ _ _ _) h₁, inv_one]
#align one_lt_inv one_lt_inv
theorem inv_le_one (ha : 1 ≤ a) : a⁻¹ ≤ 1 := by
rwa [inv_le (zero_lt_one.trans_le ha) zero_lt_one, inv_one]
#align inv_le_one inv_le_one
theorem one_le_inv (h₁ : 0 < a) (h₂ : a ≤ 1) : 1 ≤ a⁻¹ := by
rwa [le_inv (@zero_lt_one α _ _ _ _ _) h₁, inv_one]
#align one_le_inv one_le_inv
theorem inv_lt_one_iff_of_pos (h₀ : 0 < a) : a⁻¹ < 1 ↔ 1 < a :=
⟨fun h₁ => inv_inv a ▸ one_lt_inv (inv_pos.2 h₀) h₁, inv_lt_one⟩
#align inv_lt_one_iff_of_pos inv_lt_one_iff_of_pos
theorem inv_lt_one_iff : a⁻¹ < 1 ↔ a ≤ 0 ∨ 1 < a := by
rcases le_or_lt a 0 with ha | ha
· simp [ha, (inv_nonpos.2 ha).trans_lt zero_lt_one]
· simp only [ha.not_le, false_or_iff, inv_lt_one_iff_of_pos ha]
#align inv_lt_one_iff inv_lt_one_iff
theorem one_lt_inv_iff : 1 < a⁻¹ ↔ 0 < a ∧ a < 1 :=
⟨fun h => ⟨inv_pos.1 (zero_lt_one.trans h), inv_inv a ▸ inv_lt_one h⟩, and_imp.2 one_lt_inv⟩
#align one_lt_inv_iff one_lt_inv_iff
theorem inv_le_one_iff : a⁻¹ ≤ 1 ↔ a ≤ 0 ∨ 1 ≤ a := by
rcases em (a = 1) with (rfl | ha)
· simp [le_rfl]
· simp only [Ne.le_iff_lt (Ne.symm ha), Ne.le_iff_lt (mt inv_eq_one.1 ha), inv_lt_one_iff]
#align inv_le_one_iff inv_le_one_iff
theorem one_le_inv_iff : 1 ≤ a⁻¹ ↔ 0 < a ∧ a ≤ 1 :=
⟨fun h => ⟨inv_pos.1 (zero_lt_one.trans_le h), inv_inv a ▸ inv_le_one h⟩, and_imp.2 one_le_inv⟩
#align one_le_inv_iff one_le_inv_iff
@[mono, gcongr]
lemma div_le_div_of_nonneg_right (hab : a ≤ b) (hc : 0 ≤ c) : a / c ≤ b / c := by
rw [div_eq_mul_one_div a c, div_eq_mul_one_div b c]
exact mul_le_mul_of_nonneg_right hab (one_div_nonneg.2 hc)
#align div_le_div_of_le_of_nonneg div_le_div_of_nonneg_right
@[gcongr]
lemma div_lt_div_of_pos_right (h : a < b) (hc : 0 < c) : a / c < b / c := by
rw [div_eq_mul_one_div a c, div_eq_mul_one_div b c]
exact mul_lt_mul_of_pos_right h (one_div_pos.2 hc)
#align div_lt_div_of_lt div_lt_div_of_pos_right
-- Not a `mono` lemma b/c `div_le_div` is strictly more general
@[gcongr]
lemma div_le_div_of_nonneg_left (ha : 0 ≤ a) (hc : 0 < c) (h : c ≤ b) : a / b ≤ a / c := by
rw [div_eq_mul_inv, div_eq_mul_inv]
exact mul_le_mul_of_nonneg_left ((inv_le_inv (hc.trans_le h) hc).mpr h) ha
#align div_le_div_of_le_left div_le_div_of_nonneg_left
@[gcongr]
lemma div_lt_div_of_pos_left (ha : 0 < a) (hc : 0 < c) (h : c < b) : a / b < a / c := by
simpa only [div_eq_mul_inv, mul_lt_mul_left ha, inv_lt_inv (hc.trans h) hc]
#align div_lt_div_of_lt_left div_lt_div_of_pos_left
-- 2024-02-16
@[deprecated] alias div_le_div_of_le_of_nonneg := div_le_div_of_nonneg_right
@[deprecated] alias div_lt_div_of_lt := div_lt_div_of_pos_right
@[deprecated] alias div_le_div_of_le_left := div_le_div_of_nonneg_left
@[deprecated] alias div_lt_div_of_lt_left := div_lt_div_of_pos_left
@[deprecated div_le_div_of_nonneg_right (since := "2024-02-16")]
lemma div_le_div_of_le (hc : 0 ≤ c) (hab : a ≤ b) : a / c ≤ b / c :=
div_le_div_of_nonneg_right hab hc
#align div_le_div_of_le div_le_div_of_le
theorem div_le_div_right (hc : 0 < c) : a / c ≤ b / c ↔ a ≤ b :=
⟨le_imp_le_of_lt_imp_lt fun hab ↦ div_lt_div_of_pos_right hab hc,
fun hab ↦ div_le_div_of_nonneg_right hab hc.le⟩
#align div_le_div_right div_le_div_right
theorem div_lt_div_right (hc : 0 < c) : a / c < b / c ↔ a < b :=
lt_iff_lt_of_le_iff_le <| div_le_div_right hc
#align div_lt_div_right div_lt_div_right
theorem div_lt_div_left (ha : 0 < a) (hb : 0 < b) (hc : 0 < c) : a / b < a / c ↔ c < b := by
simp only [div_eq_mul_inv, mul_lt_mul_left ha, inv_lt_inv hb hc]
#align div_lt_div_left div_lt_div_left
theorem div_le_div_left (ha : 0 < a) (hb : 0 < b) (hc : 0 < c) : a / b ≤ a / c ↔ c ≤ b :=
le_iff_le_iff_lt_iff_lt.2 (div_lt_div_left ha hc hb)
#align div_le_div_left div_le_div_left
theorem div_lt_div_iff (b0 : 0 < b) (d0 : 0 < d) : a / b < c / d ↔ a * d < c * b := by
rw [lt_div_iff d0, div_mul_eq_mul_div, div_lt_iff b0]
#align div_lt_div_iff div_lt_div_iff
theorem div_le_div_iff (b0 : 0 < b) (d0 : 0 < d) : a / b ≤ c / d ↔ a * d ≤ c * b := by
rw [le_div_iff d0, div_mul_eq_mul_div, div_le_iff b0]
#align div_le_div_iff div_le_div_iff
@[mono, gcongr]
theorem div_le_div (hc : 0 ≤ c) (hac : a ≤ c) (hd : 0 < d) (hbd : d ≤ b) : a / b ≤ c / d := by
rw [div_le_div_iff (hd.trans_le hbd) hd]
exact mul_le_mul hac hbd hd.le hc
#align div_le_div div_le_div
@[gcongr]
theorem div_lt_div (hac : a < c) (hbd : d ≤ b) (c0 : 0 ≤ c) (d0 : 0 < d) : a / b < c / d :=
(div_lt_div_iff (d0.trans_le hbd) d0).2 (mul_lt_mul hac hbd d0 c0)
#align div_lt_div div_lt_div
theorem div_lt_div' (hac : a ≤ c) (hbd : d < b) (c0 : 0 < c) (d0 : 0 < d) : a / b < c / d :=
(div_lt_div_iff (d0.trans hbd) d0).2 (mul_lt_mul' hac hbd d0.le c0)
#align div_lt_div' div_lt_div'
theorem div_le_self (ha : 0 ≤ a) (hb : 1 ≤ b) : a / b ≤ a := by
simpa only [div_one] using div_le_div_of_nonneg_left ha zero_lt_one hb
#align div_le_self div_le_self
theorem div_lt_self (ha : 0 < a) (hb : 1 < b) : a / b < a := by
simpa only [div_one] using div_lt_div_of_pos_left ha zero_lt_one hb
#align div_lt_self div_lt_self
theorem le_div_self (ha : 0 ≤ a) (hb₀ : 0 < b) (hb₁ : b ≤ 1) : a ≤ a / b := by
simpa only [div_one] using div_le_div_of_nonneg_left ha hb₀ hb₁
#align le_div_self le_div_self
theorem one_le_div (hb : 0 < b) : 1 ≤ a / b ↔ b ≤ a := by rw [le_div_iff hb, one_mul]
#align one_le_div one_le_div
theorem div_le_one (hb : 0 < b) : a / b ≤ 1 ↔ a ≤ b := by rw [div_le_iff hb, one_mul]
#align div_le_one div_le_one
theorem one_lt_div (hb : 0 < b) : 1 < a / b ↔ b < a := by rw [lt_div_iff hb, one_mul]
#align one_lt_div one_lt_div
theorem div_lt_one (hb : 0 < b) : a / b < 1 ↔ a < b := by rw [div_lt_iff hb, one_mul]
#align div_lt_one div_lt_one
theorem one_div_le (ha : 0 < a) (hb : 0 < b) : 1 / a ≤ b ↔ 1 / b ≤ a := by simpa using inv_le ha hb
#align one_div_le one_div_le
theorem one_div_lt (ha : 0 < a) (hb : 0 < b) : 1 / a < b ↔ 1 / b < a := by simpa using inv_lt ha hb
#align one_div_lt one_div_lt
theorem le_one_div (ha : 0 < a) (hb : 0 < b) : a ≤ 1 / b ↔ b ≤ 1 / a := by simpa using le_inv ha hb
#align le_one_div le_one_div
theorem lt_one_div (ha : 0 < a) (hb : 0 < b) : a < 1 / b ↔ b < 1 / a := by simpa using lt_inv ha hb
#align lt_one_div lt_one_div
theorem one_div_le_one_div_of_le (ha : 0 < a) (h : a ≤ b) : 1 / b ≤ 1 / a := by
simpa using inv_le_inv_of_le ha h
#align one_div_le_one_div_of_le one_div_le_one_div_of_le
theorem one_div_lt_one_div_of_lt (ha : 0 < a) (h : a < b) : 1 / b < 1 / a := by
rwa [lt_div_iff' ha, ← div_eq_mul_one_div, div_lt_one (ha.trans h)]
#align one_div_lt_one_div_of_lt one_div_lt_one_div_of_lt
theorem le_of_one_div_le_one_div (ha : 0 < a) (h : 1 / a ≤ 1 / b) : b ≤ a :=
le_imp_le_of_lt_imp_lt (one_div_lt_one_div_of_lt ha) h
#align le_of_one_div_le_one_div le_of_one_div_le_one_div
theorem lt_of_one_div_lt_one_div (ha : 0 < a) (h : 1 / a < 1 / b) : b < a :=
lt_imp_lt_of_le_imp_le (one_div_le_one_div_of_le ha) h
#align lt_of_one_div_lt_one_div lt_of_one_div_lt_one_div
theorem one_div_le_one_div (ha : 0 < a) (hb : 0 < b) : 1 / a ≤ 1 / b ↔ b ≤ a :=
div_le_div_left zero_lt_one ha hb
#align one_div_le_one_div one_div_le_one_div
theorem one_div_lt_one_div (ha : 0 < a) (hb : 0 < b) : 1 / a < 1 / b ↔ b < a :=
div_lt_div_left zero_lt_one ha hb
#align one_div_lt_one_div one_div_lt_one_div
theorem one_lt_one_div (h1 : 0 < a) (h2 : a < 1) : 1 < 1 / a := by
rwa [lt_one_div (@zero_lt_one α _ _ _ _ _) h1, one_div_one]
#align one_lt_one_div one_lt_one_div
theorem one_le_one_div (h1 : 0 < a) (h2 : a ≤ 1) : 1 ≤ 1 / a := by
rwa [le_one_div (@zero_lt_one α _ _ _ _ _) h1, one_div_one]
#align one_le_one_div one_le_one_div
theorem add_halves (a : α) : a / 2 + a / 2 = a := by
rw [div_add_div_same, ← two_mul, mul_div_cancel_left₀ a two_ne_zero]
#align add_halves add_halves
-- TODO: Generalize to `DivisionSemiring`
theorem add_self_div_two (a : α) : (a + a) / 2 = a := by
rw [← mul_two, mul_div_cancel_right₀ a two_ne_zero]
#align add_self_div_two add_self_div_two
theorem half_pos (h : 0 < a) : 0 < a / 2 :=
div_pos h zero_lt_two
#align half_pos half_pos
theorem one_half_pos : (0 : α) < 1 / 2 :=
half_pos zero_lt_one
#align one_half_pos one_half_pos
@[simp]
theorem half_le_self_iff : a / 2 ≤ a ↔ 0 ≤ a := by
rw [div_le_iff (zero_lt_two' α), mul_two, le_add_iff_nonneg_left]
#align half_le_self_iff half_le_self_iff
@[simp]
theorem half_lt_self_iff : a / 2 < a ↔ 0 < a := by
rw [div_lt_iff (zero_lt_two' α), mul_two, lt_add_iff_pos_left]
#align half_lt_self_iff half_lt_self_iff
alias ⟨_, half_le_self⟩ := half_le_self_iff
#align half_le_self half_le_self
alias ⟨_, half_lt_self⟩ := half_lt_self_iff
#align half_lt_self half_lt_self
alias div_two_lt_of_pos := half_lt_self
#align div_two_lt_of_pos div_two_lt_of_pos
theorem one_half_lt_one : (1 / 2 : α) < 1 :=
half_lt_self zero_lt_one
#align one_half_lt_one one_half_lt_one
theorem two_inv_lt_one : (2⁻¹ : α) < 1 :=
(one_div _).symm.trans_lt one_half_lt_one
#align two_inv_lt_one two_inv_lt_one
theorem left_lt_add_div_two : a < (a + b) / 2 ↔ a < b := by simp [lt_div_iff, mul_two]
#align left_lt_add_div_two left_lt_add_div_two
theorem add_div_two_lt_right : (a + b) / 2 < b ↔ a < b := by simp [div_lt_iff, mul_two]
#align add_div_two_lt_right add_div_two_lt_right
theorem add_thirds (a : α) : a / 3 + a / 3 + a / 3 = a := by
rw [div_add_div_same, div_add_div_same, ← two_mul, ← add_one_mul 2 a, two_add_one_eq_three,
mul_div_cancel_left₀ a three_ne_zero]
@[simp] lemma div_pos_iff_of_pos_left (ha : 0 < a) : 0 < a / b ↔ 0 < b := by
simp only [div_eq_mul_inv, mul_pos_iff_of_pos_left ha, inv_pos]
@[simp] lemma div_pos_iff_of_pos_right (hb : 0 < b) : 0 < a / b ↔ 0 < a := by
simp only [div_eq_mul_inv, mul_pos_iff_of_pos_right (inv_pos.2 hb)]
| Mathlib/Algebra/Order/Field/Basic.lean | 501 | 503 | theorem mul_le_mul_of_mul_div_le (h : a * (b / c) ≤ d) (hc : 0 < c) : b * a ≤ d * c := by |
rw [← mul_div_assoc] at h
rwa [mul_comm b, ← div_le_iff hc]
|
import Mathlib.Algebra.BigOperators.Intervals
import Mathlib.Algebra.BigOperators.Ring.List
import Mathlib.Data.Int.ModEq
import Mathlib.Data.Nat.Bits
import Mathlib.Data.Nat.Log
import Mathlib.Data.List.Indexes
import Mathlib.Data.List.Palindrome
import Mathlib.Tactic.IntervalCases
import Mathlib.Tactic.Linarith
import Mathlib.Tactic.Ring
#align_import data.nat.digits from "leanprover-community/mathlib"@"369525b73f229ccd76a6ec0e0e0bf2be57599768"
namespace Nat
variable {n : ℕ}
def digitsAux0 : ℕ → List ℕ
| 0 => []
| n + 1 => [n + 1]
#align nat.digits_aux_0 Nat.digitsAux0
def digitsAux1 (n : ℕ) : List ℕ :=
List.replicate n 1
#align nat.digits_aux_1 Nat.digitsAux1
def digitsAux (b : ℕ) (h : 2 ≤ b) : ℕ → List ℕ
| 0 => []
| n + 1 =>
((n + 1) % b) :: digitsAux b h ((n + 1) / b)
decreasing_by exact Nat.div_lt_self (Nat.succ_pos _) h
#align nat.digits_aux Nat.digitsAux
@[simp]
theorem digitsAux_zero (b : ℕ) (h : 2 ≤ b) : digitsAux b h 0 = [] := by rw [digitsAux]
#align nat.digits_aux_zero Nat.digitsAux_zero
theorem digitsAux_def (b : ℕ) (h : 2 ≤ b) (n : ℕ) (w : 0 < n) :
digitsAux b h n = (n % b) :: digitsAux b h (n / b) := by
cases n
· cases w
· rw [digitsAux]
#align nat.digits_aux_def Nat.digitsAux_def
def digits : ℕ → ℕ → List ℕ
| 0 => digitsAux0
| 1 => digitsAux1
| b + 2 => digitsAux (b + 2) (by norm_num)
#align nat.digits Nat.digits
@[simp]
theorem digits_zero (b : ℕ) : digits b 0 = [] := by
rcases b with (_ | ⟨_ | ⟨_⟩⟩) <;> simp [digits, digitsAux0, digitsAux1]
#align nat.digits_zero Nat.digits_zero
-- @[simp] -- Porting note (#10618): simp can prove this
theorem digits_zero_zero : digits 0 0 = [] :=
rfl
#align nat.digits_zero_zero Nat.digits_zero_zero
@[simp]
theorem digits_zero_succ (n : ℕ) : digits 0 n.succ = [n + 1] :=
rfl
#align nat.digits_zero_succ Nat.digits_zero_succ
theorem digits_zero_succ' : ∀ {n : ℕ}, n ≠ 0 → digits 0 n = [n]
| 0, h => (h rfl).elim
| _ + 1, _ => rfl
#align nat.digits_zero_succ' Nat.digits_zero_succ'
@[simp]
theorem digits_one (n : ℕ) : digits 1 n = List.replicate n 1 :=
rfl
#align nat.digits_one Nat.digits_one
-- @[simp] -- Porting note (#10685): dsimp can prove this
theorem digits_one_succ (n : ℕ) : digits 1 (n + 1) = 1 :: digits 1 n :=
rfl
#align nat.digits_one_succ Nat.digits_one_succ
theorem digits_add_two_add_one (b n : ℕ) :
digits (b + 2) (n + 1) = ((n + 1) % (b + 2)) :: digits (b + 2) ((n + 1) / (b + 2)) := by
simp [digits, digitsAux_def]
#align nat.digits_add_two_add_one Nat.digits_add_two_add_one
@[simp]
lemma digits_of_two_le_of_pos {b : ℕ} (hb : 2 ≤ b) (hn : 0 < n) :
Nat.digits b n = n % b :: Nat.digits b (n / b) := by
rw [Nat.eq_add_of_sub_eq hb rfl, Nat.eq_add_of_sub_eq hn rfl, Nat.digits_add_two_add_one]
theorem digits_def' :
∀ {b : ℕ} (_ : 1 < b) {n : ℕ} (_ : 0 < n), digits b n = (n % b) :: digits b (n / b)
| 0, h => absurd h (by decide)
| 1, h => absurd h (by decide)
| b + 2, _ => digitsAux_def _ (by simp) _
#align nat.digits_def' Nat.digits_def'
@[simp]
theorem digits_of_lt (b x : ℕ) (hx : x ≠ 0) (hxb : x < b) : digits b x = [x] := by
rcases exists_eq_succ_of_ne_zero hx with ⟨x, rfl⟩
rcases Nat.exists_eq_add_of_le' ((Nat.le_add_left 1 x).trans_lt hxb) with ⟨b, rfl⟩
rw [digits_add_two_add_one, div_eq_of_lt hxb, digits_zero, mod_eq_of_lt hxb]
#align nat.digits_of_lt Nat.digits_of_lt
theorem digits_add (b : ℕ) (h : 1 < b) (x y : ℕ) (hxb : x < b) (hxy : x ≠ 0 ∨ y ≠ 0) :
digits b (x + b * y) = x :: digits b y := by
rcases Nat.exists_eq_add_of_le' h with ⟨b, rfl : _ = _ + 2⟩
cases y
· simp [hxb, hxy.resolve_right (absurd rfl)]
dsimp [digits]
rw [digitsAux_def]
· congr
· simp [Nat.add_mod, mod_eq_of_lt hxb]
· simp [add_mul_div_left, div_eq_of_lt hxb]
· apply Nat.succ_pos
#align nat.digits_add Nat.digits_add
-- If we had a function converting a list into a polynomial,
-- and appropriate lemmas about that function,
-- we could rewrite this in terms of that.
def ofDigits {α : Type*} [Semiring α] (b : α) : List ℕ → α
| [] => 0
| h :: t => h + b * ofDigits b t
#align nat.of_digits Nat.ofDigits
| Mathlib/Data/Nat/Digits.lean | 167 | 172 | theorem ofDigits_eq_foldr {α : Type*} [Semiring α] (b : α) (L : List ℕ) :
ofDigits b L = List.foldr (fun x y => ↑x + b * y) 0 L := by |
induction' L with d L ih
· rfl
· dsimp [ofDigits]
rw [ih]
|
import Mathlib.Data.Set.Image
import Mathlib.Order.SuccPred.Relation
import Mathlib.Topology.Clopen
import Mathlib.Topology.Irreducible
#align_import topology.connected from "leanprover-community/mathlib"@"d101e93197bb5f6ea89bd7ba386b7f7dff1f3903"
open Set Function Topology TopologicalSpace Relation
open scoped Classical
universe u v
variable {α : Type u} {β : Type v} {ι : Type*} {π : ι → Type*} [TopologicalSpace α]
{s t u v : Set α}
section Preconnected
def IsPreconnected (s : Set α) : Prop :=
∀ u v : Set α, IsOpen u → IsOpen v → s ⊆ u ∪ v → (s ∩ u).Nonempty → (s ∩ v).Nonempty →
(s ∩ (u ∩ v)).Nonempty
#align is_preconnected IsPreconnected
def IsConnected (s : Set α) : Prop :=
s.Nonempty ∧ IsPreconnected s
#align is_connected IsConnected
theorem IsConnected.nonempty {s : Set α} (h : IsConnected s) : s.Nonempty :=
h.1
#align is_connected.nonempty IsConnected.nonempty
theorem IsConnected.isPreconnected {s : Set α} (h : IsConnected s) : IsPreconnected s :=
h.2
#align is_connected.is_preconnected IsConnected.isPreconnected
theorem IsPreirreducible.isPreconnected {s : Set α} (H : IsPreirreducible s) : IsPreconnected s :=
fun _ _ hu hv _ => H _ _ hu hv
#align is_preirreducible.is_preconnected IsPreirreducible.isPreconnected
theorem IsIrreducible.isConnected {s : Set α} (H : IsIrreducible s) : IsConnected s :=
⟨H.nonempty, H.isPreirreducible.isPreconnected⟩
#align is_irreducible.is_connected IsIrreducible.isConnected
theorem isPreconnected_empty : IsPreconnected (∅ : Set α) :=
isPreirreducible_empty.isPreconnected
#align is_preconnected_empty isPreconnected_empty
theorem isConnected_singleton {x} : IsConnected ({x} : Set α) :=
isIrreducible_singleton.isConnected
#align is_connected_singleton isConnected_singleton
theorem isPreconnected_singleton {x} : IsPreconnected ({x} : Set α) :=
isConnected_singleton.isPreconnected
#align is_preconnected_singleton isPreconnected_singleton
theorem Set.Subsingleton.isPreconnected {s : Set α} (hs : s.Subsingleton) : IsPreconnected s :=
hs.induction_on isPreconnected_empty fun _ => isPreconnected_singleton
#align set.subsingleton.is_preconnected Set.Subsingleton.isPreconnected
theorem isPreconnected_of_forall {s : Set α} (x : α)
(H : ∀ y ∈ s, ∃ t, t ⊆ s ∧ x ∈ t ∧ y ∈ t ∧ IsPreconnected t) : IsPreconnected s := by
rintro u v hu hv hs ⟨z, zs, zu⟩ ⟨y, ys, yv⟩
have xs : x ∈ s := by
rcases H y ys with ⟨t, ts, xt, -, -⟩
exact ts xt
-- Porting note (#11215): TODO: use `wlog xu : x ∈ u := hs xs using u v y z, v u z y`
cases hs xs with
| inl xu =>
rcases H y ys with ⟨t, ts, xt, yt, ht⟩
have := ht u v hu hv (ts.trans hs) ⟨x, xt, xu⟩ ⟨y, yt, yv⟩
exact this.imp fun z hz => ⟨ts hz.1, hz.2⟩
| inr xv =>
rcases H z zs with ⟨t, ts, xt, zt, ht⟩
have := ht v u hv hu (ts.trans <| by rwa [union_comm]) ⟨x, xt, xv⟩ ⟨z, zt, zu⟩
exact this.imp fun _ h => ⟨ts h.1, h.2.2, h.2.1⟩
#align is_preconnected_of_forall isPreconnected_of_forall
theorem isPreconnected_of_forall_pair {s : Set α}
(H : ∀ x ∈ s, ∀ y ∈ s, ∃ t, t ⊆ s ∧ x ∈ t ∧ y ∈ t ∧ IsPreconnected t) :
IsPreconnected s := by
rcases eq_empty_or_nonempty s with (rfl | ⟨x, hx⟩)
exacts [isPreconnected_empty, isPreconnected_of_forall x fun y => H x hx y]
#align is_preconnected_of_forall_pair isPreconnected_of_forall_pair
theorem isPreconnected_sUnion (x : α) (c : Set (Set α)) (H1 : ∀ s ∈ c, x ∈ s)
(H2 : ∀ s ∈ c, IsPreconnected s) : IsPreconnected (⋃₀ c) := by
apply isPreconnected_of_forall x
rintro y ⟨s, sc, ys⟩
exact ⟨s, subset_sUnion_of_mem sc, H1 s sc, ys, H2 s sc⟩
#align is_preconnected_sUnion isPreconnected_sUnion
theorem isPreconnected_iUnion {ι : Sort*} {s : ι → Set α} (h₁ : (⋂ i, s i).Nonempty)
(h₂ : ∀ i, IsPreconnected (s i)) : IsPreconnected (⋃ i, s i) :=
Exists.elim h₁ fun f hf => isPreconnected_sUnion f _ hf (forall_mem_range.2 h₂)
#align is_preconnected_Union isPreconnected_iUnion
theorem IsPreconnected.union (x : α) {s t : Set α} (H1 : x ∈ s) (H2 : x ∈ t) (H3 : IsPreconnected s)
(H4 : IsPreconnected t) : IsPreconnected (s ∪ t) :=
sUnion_pair s t ▸ isPreconnected_sUnion x {s, t} (by rintro r (rfl | rfl | h) <;> assumption)
(by rintro r (rfl | rfl | h) <;> assumption)
#align is_preconnected.union IsPreconnected.union
theorem IsPreconnected.union' {s t : Set α} (H : (s ∩ t).Nonempty) (hs : IsPreconnected s)
(ht : IsPreconnected t) : IsPreconnected (s ∪ t) := by
rcases H with ⟨x, hxs, hxt⟩
exact hs.union x hxs hxt ht
#align is_preconnected.union' IsPreconnected.union'
theorem IsConnected.union {s t : Set α} (H : (s ∩ t).Nonempty) (Hs : IsConnected s)
(Ht : IsConnected t) : IsConnected (s ∪ t) := by
rcases H with ⟨x, hx⟩
refine ⟨⟨x, mem_union_left t (mem_of_mem_inter_left hx)⟩, ?_⟩
exact Hs.isPreconnected.union x (mem_of_mem_inter_left hx) (mem_of_mem_inter_right hx)
Ht.isPreconnected
#align is_connected.union IsConnected.union
theorem IsPreconnected.sUnion_directed {S : Set (Set α)} (K : DirectedOn (· ⊆ ·) S)
(H : ∀ s ∈ S, IsPreconnected s) : IsPreconnected (⋃₀ S) := by
rintro u v hu hv Huv ⟨a, ⟨s, hsS, has⟩, hau⟩ ⟨b, ⟨t, htS, hbt⟩, hbv⟩
obtain ⟨r, hrS, hsr, htr⟩ : ∃ r ∈ S, s ⊆ r ∧ t ⊆ r := K s hsS t htS
have Hnuv : (r ∩ (u ∩ v)).Nonempty :=
H _ hrS u v hu hv ((subset_sUnion_of_mem hrS).trans Huv) ⟨a, hsr has, hau⟩ ⟨b, htr hbt, hbv⟩
have Kruv : r ∩ (u ∩ v) ⊆ ⋃₀ S ∩ (u ∩ v) := inter_subset_inter_left _ (subset_sUnion_of_mem hrS)
exact Hnuv.mono Kruv
#align is_preconnected.sUnion_directed IsPreconnected.sUnion_directed
theorem IsPreconnected.biUnion_of_reflTransGen {ι : Type*} {t : Set ι} {s : ι → Set α}
(H : ∀ i ∈ t, IsPreconnected (s i))
(K : ∀ i, i ∈ t → ∀ j, j ∈ t → ReflTransGen (fun i j => (s i ∩ s j).Nonempty ∧ i ∈ t) i j) :
IsPreconnected (⋃ n ∈ t, s n) := by
let R := fun i j : ι => (s i ∩ s j).Nonempty ∧ i ∈ t
have P : ∀ i, i ∈ t → ∀ j, j ∈ t → ReflTransGen R i j →
∃ p, p ⊆ t ∧ i ∈ p ∧ j ∈ p ∧ IsPreconnected (⋃ j ∈ p, s j) := fun i hi j hj h => by
induction h with
| refl =>
refine ⟨{i}, singleton_subset_iff.mpr hi, mem_singleton i, mem_singleton i, ?_⟩
rw [biUnion_singleton]
exact H i hi
| @tail j k _ hjk ih =>
obtain ⟨p, hpt, hip, hjp, hp⟩ := ih hjk.2
refine ⟨insert k p, insert_subset_iff.mpr ⟨hj, hpt⟩, mem_insert_of_mem k hip,
mem_insert k p, ?_⟩
rw [biUnion_insert]
refine (H k hj).union' (hjk.1.mono ?_) hp
rw [inter_comm]
exact inter_subset_inter_right _ (subset_biUnion_of_mem hjp)
refine isPreconnected_of_forall_pair ?_
intro x hx y hy
obtain ⟨i : ι, hi : i ∈ t, hxi : x ∈ s i⟩ := mem_iUnion₂.1 hx
obtain ⟨j : ι, hj : j ∈ t, hyj : y ∈ s j⟩ := mem_iUnion₂.1 hy
obtain ⟨p, hpt, hip, hjp, hp⟩ := P i hi j hj (K i hi j hj)
exact ⟨⋃ j ∈ p, s j, biUnion_subset_biUnion_left hpt, mem_biUnion hip hxi,
mem_biUnion hjp hyj, hp⟩
#align is_preconnected.bUnion_of_refl_trans_gen IsPreconnected.biUnion_of_reflTransGen
theorem IsConnected.biUnion_of_reflTransGen {ι : Type*} {t : Set ι} {s : ι → Set α}
(ht : t.Nonempty) (H : ∀ i ∈ t, IsConnected (s i))
(K : ∀ i, i ∈ t → ∀ j, j ∈ t → ReflTransGen (fun i j : ι => (s i ∩ s j).Nonempty ∧ i ∈ t) i j) :
IsConnected (⋃ n ∈ t, s n) :=
⟨nonempty_biUnion.2 <| ⟨ht.some, ht.some_mem, (H _ ht.some_mem).nonempty⟩,
IsPreconnected.biUnion_of_reflTransGen (fun i hi => (H i hi).isPreconnected) K⟩
#align is_connected.bUnion_of_refl_trans_gen IsConnected.biUnion_of_reflTransGen
theorem IsPreconnected.iUnion_of_reflTransGen {ι : Type*} {s : ι → Set α}
(H : ∀ i, IsPreconnected (s i))
(K : ∀ i j, ReflTransGen (fun i j : ι => (s i ∩ s j).Nonempty) i j) :
IsPreconnected (⋃ n, s n) := by
rw [← biUnion_univ]
exact IsPreconnected.biUnion_of_reflTransGen (fun i _ => H i) fun i _ j _ => by
simpa [mem_univ] using K i j
#align is_preconnected.Union_of_refl_trans_gen IsPreconnected.iUnion_of_reflTransGen
theorem IsConnected.iUnion_of_reflTransGen {ι : Type*} [Nonempty ι] {s : ι → Set α}
(H : ∀ i, IsConnected (s i))
(K : ∀ i j, ReflTransGen (fun i j : ι => (s i ∩ s j).Nonempty) i j) : IsConnected (⋃ n, s n) :=
⟨nonempty_iUnion.2 <| Nonempty.elim ‹_› fun i : ι => ⟨i, (H _).nonempty⟩,
IsPreconnected.iUnion_of_reflTransGen (fun i => (H i).isPreconnected) K⟩
#align is_connected.Union_of_refl_trans_gen IsConnected.iUnion_of_reflTransGen
protected theorem IsPreconnected.subset_closure {s : Set α} {t : Set α} (H : IsPreconnected s)
(Kst : s ⊆ t) (Ktcs : t ⊆ closure s) : IsPreconnected t :=
fun u v hu hv htuv ⟨_y, hyt, hyu⟩ ⟨_z, hzt, hzv⟩ =>
let ⟨p, hpu, hps⟩ := mem_closure_iff.1 (Ktcs hyt) u hu hyu
let ⟨q, hqv, hqs⟩ := mem_closure_iff.1 (Ktcs hzt) v hv hzv
let ⟨r, hrs, hruv⟩ := H u v hu hv (Subset.trans Kst htuv) ⟨p, hps, hpu⟩ ⟨q, hqs, hqv⟩
⟨r, Kst hrs, hruv⟩
#align is_preconnected.subset_closure IsPreconnected.subset_closure
protected theorem IsConnected.subset_closure {s : Set α} {t : Set α} (H : IsConnected s)
(Kst : s ⊆ t) (Ktcs : t ⊆ closure s) : IsConnected t :=
⟨Nonempty.mono Kst H.left, IsPreconnected.subset_closure H.right Kst Ktcs⟩
#align is_connected.subset_closure IsConnected.subset_closure
protected theorem IsPreconnected.closure {s : Set α} (H : IsPreconnected s) :
IsPreconnected (closure s) :=
IsPreconnected.subset_closure H subset_closure Subset.rfl
#align is_preconnected.closure IsPreconnected.closure
protected theorem IsConnected.closure {s : Set α} (H : IsConnected s) : IsConnected (closure s) :=
IsConnected.subset_closure H subset_closure <| Subset.rfl
#align is_connected.closure IsConnected.closure
protected theorem IsPreconnected.image [TopologicalSpace β] {s : Set α} (H : IsPreconnected s)
(f : α → β) (hf : ContinuousOn f s) : IsPreconnected (f '' s) := by
-- Unfold/destruct definitions in hypotheses
rintro u v hu hv huv ⟨_, ⟨x, xs, rfl⟩, xu⟩ ⟨_, ⟨y, ys, rfl⟩, yv⟩
rcases continuousOn_iff'.1 hf u hu with ⟨u', hu', u'_eq⟩
rcases continuousOn_iff'.1 hf v hv with ⟨v', hv', v'_eq⟩
-- Reformulate `huv : f '' s ⊆ u ∪ v` in terms of `u'` and `v'`
replace huv : s ⊆ u' ∪ v' := by
rw [image_subset_iff, preimage_union] at huv
replace huv := subset_inter huv Subset.rfl
rw [union_inter_distrib_right, u'_eq, v'_eq, ← union_inter_distrib_right] at huv
exact (subset_inter_iff.1 huv).1
-- Now `s ⊆ u' ∪ v'`, so we can apply `‹IsPreconnected s›`
obtain ⟨z, hz⟩ : (s ∩ (u' ∩ v')).Nonempty := by
refine H u' v' hu' hv' huv ⟨x, ?_⟩ ⟨y, ?_⟩ <;> rw [inter_comm]
exacts [u'_eq ▸ ⟨xu, xs⟩, v'_eq ▸ ⟨yv, ys⟩]
rw [← inter_self s, inter_assoc, inter_left_comm s u', ← inter_assoc, inter_comm s, inter_comm s,
← u'_eq, ← v'_eq] at hz
exact ⟨f z, ⟨z, hz.1.2, rfl⟩, hz.1.1, hz.2.1⟩
#align is_preconnected.image IsPreconnected.image
protected theorem IsConnected.image [TopologicalSpace β] {s : Set α} (H : IsConnected s) (f : α → β)
(hf : ContinuousOn f s) : IsConnected (f '' s) :=
⟨image_nonempty.mpr H.nonempty, H.isPreconnected.image f hf⟩
#align is_connected.image IsConnected.image
theorem isPreconnected_closed_iff {s : Set α} :
IsPreconnected s ↔ ∀ t t', IsClosed t → IsClosed t' →
s ⊆ t ∪ t' → (s ∩ t).Nonempty → (s ∩ t').Nonempty → (s ∩ (t ∩ t')).Nonempty :=
⟨by
rintro h t t' ht ht' htt' ⟨x, xs, xt⟩ ⟨y, ys, yt'⟩
rw [← not_disjoint_iff_nonempty_inter, ← subset_compl_iff_disjoint_right, compl_inter]
intro h'
have xt' : x ∉ t' := (h' xs).resolve_left (absurd xt)
have yt : y ∉ t := (h' ys).resolve_right (absurd yt')
have := h _ _ ht.isOpen_compl ht'.isOpen_compl h' ⟨y, ys, yt⟩ ⟨x, xs, xt'⟩
rw [← compl_union] at this
exact this.ne_empty htt'.disjoint_compl_right.inter_eq,
by
rintro h u v hu hv huv ⟨x, xs, xu⟩ ⟨y, ys, yv⟩
rw [← not_disjoint_iff_nonempty_inter, ← subset_compl_iff_disjoint_right, compl_inter]
intro h'
have xv : x ∉ v := (h' xs).elim (absurd xu) id
have yu : y ∉ u := (h' ys).elim id (absurd yv)
have := h _ _ hu.isClosed_compl hv.isClosed_compl h' ⟨y, ys, yu⟩ ⟨x, xs, xv⟩
rw [← compl_union] at this
exact this.ne_empty huv.disjoint_compl_right.inter_eq⟩
#align is_preconnected_closed_iff isPreconnected_closed_iff
theorem Inducing.isPreconnected_image [TopologicalSpace β] {s : Set α} {f : α → β}
(hf : Inducing f) : IsPreconnected (f '' s) ↔ IsPreconnected s := by
refine ⟨fun h => ?_, fun h => h.image _ hf.continuous.continuousOn⟩
rintro u v hu' hv' huv ⟨x, hxs, hxu⟩ ⟨y, hys, hyv⟩
rcases hf.isOpen_iff.1 hu' with ⟨u, hu, rfl⟩
rcases hf.isOpen_iff.1 hv' with ⟨v, hv, rfl⟩
replace huv : f '' s ⊆ u ∪ v := by rwa [image_subset_iff]
rcases h u v hu hv huv ⟨f x, mem_image_of_mem _ hxs, hxu⟩ ⟨f y, mem_image_of_mem _ hys, hyv⟩ with
⟨_, ⟨z, hzs, rfl⟩, hzuv⟩
exact ⟨z, hzs, hzuv⟩
#align inducing.is_preconnected_image Inducing.isPreconnected_image
theorem IsPreconnected.preimage_of_isOpenMap [TopologicalSpace β] {f : α → β} {s : Set β}
(hs : IsPreconnected s) (hinj : Function.Injective f) (hf : IsOpenMap f) (hsf : s ⊆ range f) :
IsPreconnected (f ⁻¹' s) := fun u v hu hv hsuv hsu hsv => by
replace hsf : f '' (f ⁻¹' s) = s := image_preimage_eq_of_subset hsf
obtain ⟨_, has, ⟨a, hau, rfl⟩, hav⟩ : (s ∩ (f '' u ∩ f '' v)).Nonempty := by
refine hs (f '' u) (f '' v) (hf u hu) (hf v hv) ?_ ?_ ?_
· simpa only [hsf, image_union] using image_subset f hsuv
· simpa only [image_preimage_inter] using hsu.image f
· simpa only [image_preimage_inter] using hsv.image f
· exact ⟨a, has, hau, hinj.mem_set_image.1 hav⟩
#align is_preconnected.preimage_of_open_map IsPreconnected.preimage_of_isOpenMap
theorem IsPreconnected.preimage_of_isClosedMap [TopologicalSpace β] {s : Set β}
(hs : IsPreconnected s) {f : α → β} (hinj : Function.Injective f) (hf : IsClosedMap f)
(hsf : s ⊆ range f) : IsPreconnected (f ⁻¹' s) :=
isPreconnected_closed_iff.2 fun u v hu hv hsuv hsu hsv => by
replace hsf : f '' (f ⁻¹' s) = s := image_preimage_eq_of_subset hsf
obtain ⟨_, has, ⟨a, hau, rfl⟩, hav⟩ : (s ∩ (f '' u ∩ f '' v)).Nonempty := by
refine isPreconnected_closed_iff.1 hs (f '' u) (f '' v) (hf u hu) (hf v hv) ?_ ?_ ?_
· simpa only [hsf, image_union] using image_subset f hsuv
· simpa only [image_preimage_inter] using hsu.image f
· simpa only [image_preimage_inter] using hsv.image f
· exact ⟨a, has, hau, hinj.mem_set_image.1 hav⟩
#align is_preconnected.preimage_of_closed_map IsPreconnected.preimage_of_isClosedMap
theorem IsConnected.preimage_of_isOpenMap [TopologicalSpace β] {s : Set β} (hs : IsConnected s)
{f : α → β} (hinj : Function.Injective f) (hf : IsOpenMap f) (hsf : s ⊆ range f) :
IsConnected (f ⁻¹' s) :=
⟨hs.nonempty.preimage' hsf, hs.isPreconnected.preimage_of_isOpenMap hinj hf hsf⟩
#align is_connected.preimage_of_open_map IsConnected.preimage_of_isOpenMap
theorem IsConnected.preimage_of_isClosedMap [TopologicalSpace β] {s : Set β} (hs : IsConnected s)
{f : α → β} (hinj : Function.Injective f) (hf : IsClosedMap f) (hsf : s ⊆ range f) :
IsConnected (f ⁻¹' s) :=
⟨hs.nonempty.preimage' hsf, hs.isPreconnected.preimage_of_isClosedMap hinj hf hsf⟩
#align is_connected.preimage_of_closed_map IsConnected.preimage_of_isClosedMap
theorem IsPreconnected.subset_or_subset (hu : IsOpen u) (hv : IsOpen v) (huv : Disjoint u v)
(hsuv : s ⊆ u ∪ v) (hs : IsPreconnected s) : s ⊆ u ∨ s ⊆ v := by
specialize hs u v hu hv hsuv
obtain hsu | hsu := (s ∩ u).eq_empty_or_nonempty
· exact Or.inr ((Set.disjoint_iff_inter_eq_empty.2 hsu).subset_right_of_subset_union hsuv)
· replace hs := mt (hs hsu)
simp_rw [Set.not_nonempty_iff_eq_empty, ← Set.disjoint_iff_inter_eq_empty,
disjoint_iff_inter_eq_empty.1 huv] at hs
exact Or.inl ((hs s.disjoint_empty).subset_left_of_subset_union hsuv)
#align is_preconnected.subset_or_subset IsPreconnected.subset_or_subset
theorem IsPreconnected.subset_left_of_subset_union (hu : IsOpen u) (hv : IsOpen v)
(huv : Disjoint u v) (hsuv : s ⊆ u ∪ v) (hsu : (s ∩ u).Nonempty) (hs : IsPreconnected s) :
s ⊆ u :=
Disjoint.subset_left_of_subset_union hsuv
(by
by_contra hsv
rw [not_disjoint_iff_nonempty_inter] at hsv
obtain ⟨x, _, hx⟩ := hs u v hu hv hsuv hsu hsv
exact Set.disjoint_iff.1 huv hx)
#align is_preconnected.subset_left_of_subset_union IsPreconnected.subset_left_of_subset_union
theorem IsPreconnected.subset_right_of_subset_union (hu : IsOpen u) (hv : IsOpen v)
(huv : Disjoint u v) (hsuv : s ⊆ u ∪ v) (hsv : (s ∩ v).Nonempty) (hs : IsPreconnected s) :
s ⊆ v :=
hs.subset_left_of_subset_union hv hu huv.symm (union_comm u v ▸ hsuv) hsv
#align is_preconnected.subset_right_of_subset_union IsPreconnected.subset_right_of_subset_union
-- Porting note: moved up
theorem IsPreconnected.subset_isClopen {s t : Set α} (hs : IsPreconnected s) (ht : IsClopen t)
(hne : (s ∩ t).Nonempty) : s ⊆ t :=
hs.subset_left_of_subset_union ht.isOpen ht.compl.isOpen disjoint_compl_right (by simp) hne
#align is_preconnected.subset_clopen IsPreconnected.subset_isClopen
theorem IsPreconnected.subset_of_closure_inter_subset (hs : IsPreconnected s) (hu : IsOpen u)
(h'u : (s ∩ u).Nonempty) (h : closure u ∩ s ⊆ u) : s ⊆ u := by
have A : s ⊆ u ∪ (closure u)ᶜ := by
intro x hx
by_cases xu : x ∈ u
· exact Or.inl xu
· right
intro h'x
exact xu (h (mem_inter h'x hx))
apply hs.subset_left_of_subset_union hu isClosed_closure.isOpen_compl _ A h'u
exact disjoint_compl_right.mono_right (compl_subset_compl.2 subset_closure)
#align is_preconnected.subset_of_closure_inter_subset IsPreconnected.subset_of_closure_inter_subset
theorem IsPreconnected.prod [TopologicalSpace β] {s : Set α} {t : Set β} (hs : IsPreconnected s)
(ht : IsPreconnected t) : IsPreconnected (s ×ˢ t) := by
apply isPreconnected_of_forall_pair
rintro ⟨a₁, b₁⟩ ⟨ha₁, hb₁⟩ ⟨a₂, b₂⟩ ⟨ha₂, hb₂⟩
refine ⟨Prod.mk a₁ '' t ∪ flip Prod.mk b₂ '' s, ?_, .inl ⟨b₁, hb₁, rfl⟩, .inr ⟨a₂, ha₂, rfl⟩, ?_⟩
· rintro _ (⟨y, hy, rfl⟩ | ⟨x, hx, rfl⟩)
exacts [⟨ha₁, hy⟩, ⟨hx, hb₂⟩]
· exact (ht.image _ (Continuous.Prod.mk _).continuousOn).union (a₁, b₂) ⟨b₂, hb₂, rfl⟩
⟨a₁, ha₁, rfl⟩ (hs.image _ (continuous_id.prod_mk continuous_const).continuousOn)
#align is_preconnected.prod IsPreconnected.prod
theorem IsConnected.prod [TopologicalSpace β] {s : Set α} {t : Set β} (hs : IsConnected s)
(ht : IsConnected t) : IsConnected (s ×ˢ t) :=
⟨hs.1.prod ht.1, hs.2.prod ht.2⟩
#align is_connected.prod IsConnected.prod
theorem isPreconnected_univ_pi [∀ i, TopologicalSpace (π i)] {s : ∀ i, Set (π i)}
(hs : ∀ i, IsPreconnected (s i)) : IsPreconnected (pi univ s) := by
rintro u v uo vo hsuv ⟨f, hfs, hfu⟩ ⟨g, hgs, hgv⟩
rcases exists_finset_piecewise_mem_of_mem_nhds (uo.mem_nhds hfu) g with ⟨I, hI⟩
induction' I using Finset.induction_on with i I _ ihI
· refine ⟨g, hgs, ⟨?_, hgv⟩⟩
simpa using hI
· rw [Finset.piecewise_insert] at hI
have := I.piecewise_mem_set_pi hfs hgs
refine (hsuv this).elim ihI fun h => ?_
set S := update (I.piecewise f g) i '' s i
have hsub : S ⊆ pi univ s := by
refine image_subset_iff.2 fun z hz => ?_
rwa [update_preimage_univ_pi]
exact fun j _ => this j trivial
have hconn : IsPreconnected S :=
(hs i).image _ (continuous_const.update i continuous_id).continuousOn
have hSu : (S ∩ u).Nonempty := ⟨_, mem_image_of_mem _ (hfs _ trivial), hI⟩
have hSv : (S ∩ v).Nonempty := ⟨_, ⟨_, this _ trivial, update_eq_self _ _⟩, h⟩
refine (hconn u v uo vo (hsub.trans hsuv) hSu hSv).mono ?_
exact inter_subset_inter_left _ hsub
#align is_preconnected_univ_pi isPreconnected_univ_pi
@[simp]
theorem isConnected_univ_pi [∀ i, TopologicalSpace (π i)] {s : ∀ i, Set (π i)} :
IsConnected (pi univ s) ↔ ∀ i, IsConnected (s i) := by
simp only [IsConnected, ← univ_pi_nonempty_iff, forall_and, and_congr_right_iff]
refine fun hne => ⟨fun hc i => ?_, isPreconnected_univ_pi⟩
rw [← eval_image_univ_pi hne]
exact hc.image _ (continuous_apply _).continuousOn
#align is_connected_univ_pi isConnected_univ_pi
theorem Sigma.isConnected_iff [∀ i, TopologicalSpace (π i)] {s : Set (Σi, π i)} :
IsConnected s ↔ ∃ i t, IsConnected t ∧ s = Sigma.mk i '' t := by
refine ⟨fun hs => ?_, ?_⟩
· obtain ⟨⟨i, x⟩, hx⟩ := hs.nonempty
have : s ⊆ range (Sigma.mk i) :=
hs.isPreconnected.subset_isClopen isClopen_range_sigmaMk ⟨⟨i, x⟩, hx, x, rfl⟩
exact ⟨i, Sigma.mk i ⁻¹' s, hs.preimage_of_isOpenMap sigma_mk_injective isOpenMap_sigmaMk this,
(Set.image_preimage_eq_of_subset this).symm⟩
· rintro ⟨i, t, ht, rfl⟩
exact ht.image _ continuous_sigmaMk.continuousOn
#align sigma.is_connected_iff Sigma.isConnected_iff
theorem Sigma.isPreconnected_iff [hι : Nonempty ι] [∀ i, TopologicalSpace (π i)]
{s : Set (Σi, π i)} : IsPreconnected s ↔ ∃ i t, IsPreconnected t ∧ s = Sigma.mk i '' t := by
refine ⟨fun hs => ?_, ?_⟩
· obtain rfl | h := s.eq_empty_or_nonempty
· exact ⟨Classical.choice hι, ∅, isPreconnected_empty, (Set.image_empty _).symm⟩
· obtain ⟨a, t, ht, rfl⟩ := Sigma.isConnected_iff.1 ⟨h, hs⟩
exact ⟨a, t, ht.isPreconnected, rfl⟩
· rintro ⟨a, t, ht, rfl⟩
exact ht.image _ continuous_sigmaMk.continuousOn
#align sigma.is_preconnected_iff Sigma.isPreconnected_iff
theorem Sum.isConnected_iff [TopologicalSpace β] {s : Set (Sum α β)} :
IsConnected s ↔
(∃ t, IsConnected t ∧ s = Sum.inl '' t) ∨ ∃ t, IsConnected t ∧ s = Sum.inr '' t := by
refine ⟨fun hs => ?_, ?_⟩
· obtain ⟨x | x, hx⟩ := hs.nonempty
· have h : s ⊆ range Sum.inl :=
hs.isPreconnected.subset_isClopen isClopen_range_inl ⟨.inl x, hx, x, rfl⟩
refine Or.inl ⟨Sum.inl ⁻¹' s, ?_, ?_⟩
· exact hs.preimage_of_isOpenMap Sum.inl_injective isOpenMap_inl h
· exact (image_preimage_eq_of_subset h).symm
· have h : s ⊆ range Sum.inr :=
hs.isPreconnected.subset_isClopen isClopen_range_inr ⟨.inr x, hx, x, rfl⟩
refine Or.inr ⟨Sum.inr ⁻¹' s, ?_, ?_⟩
· exact hs.preimage_of_isOpenMap Sum.inr_injective isOpenMap_inr h
· exact (image_preimage_eq_of_subset h).symm
· rintro (⟨t, ht, rfl⟩ | ⟨t, ht, rfl⟩)
· exact ht.image _ continuous_inl.continuousOn
· exact ht.image _ continuous_inr.continuousOn
#align sum.is_connected_iff Sum.isConnected_iff
theorem Sum.isPreconnected_iff [TopologicalSpace β] {s : Set (Sum α β)} :
IsPreconnected s ↔
(∃ t, IsPreconnected t ∧ s = Sum.inl '' t) ∨ ∃ t, IsPreconnected t ∧ s = Sum.inr '' t := by
refine ⟨fun hs => ?_, ?_⟩
· obtain rfl | h := s.eq_empty_or_nonempty
· exact Or.inl ⟨∅, isPreconnected_empty, (Set.image_empty _).symm⟩
obtain ⟨t, ht, rfl⟩ | ⟨t, ht, rfl⟩ := Sum.isConnected_iff.1 ⟨h, hs⟩
· exact Or.inl ⟨t, ht.isPreconnected, rfl⟩
· exact Or.inr ⟨t, ht.isPreconnected, rfl⟩
· rintro (⟨t, ht, rfl⟩ | ⟨t, ht, rfl⟩)
· exact ht.image _ continuous_inl.continuousOn
· exact ht.image _ continuous_inr.continuousOn
#align sum.is_preconnected_iff Sum.isPreconnected_iff
def connectedComponent (x : α) : Set α :=
⋃₀ { s : Set α | IsPreconnected s ∧ x ∈ s }
#align connected_component connectedComponent
def connectedComponentIn (F : Set α) (x : α) : Set α :=
if h : x ∈ F then (↑) '' connectedComponent (⟨x, h⟩ : F) else ∅
#align connected_component_in connectedComponentIn
theorem connectedComponentIn_eq_image {F : Set α} {x : α} (h : x ∈ F) :
connectedComponentIn F x = (↑) '' connectedComponent (⟨x, h⟩ : F) :=
dif_pos h
#align connected_component_in_eq_image connectedComponentIn_eq_image
theorem connectedComponentIn_eq_empty {F : Set α} {x : α} (h : x ∉ F) :
connectedComponentIn F x = ∅ :=
dif_neg h
#align connected_component_in_eq_empty connectedComponentIn_eq_empty
theorem mem_connectedComponent {x : α} : x ∈ connectedComponent x :=
mem_sUnion_of_mem (mem_singleton x) ⟨isPreconnected_singleton, mem_singleton x⟩
#align mem_connected_component mem_connectedComponent
theorem mem_connectedComponentIn {x : α} {F : Set α} (hx : x ∈ F) :
x ∈ connectedComponentIn F x := by
simp [connectedComponentIn_eq_image hx, mem_connectedComponent, hx]
#align mem_connected_component_in mem_connectedComponentIn
theorem connectedComponent_nonempty {x : α} : (connectedComponent x).Nonempty :=
⟨x, mem_connectedComponent⟩
#align connected_component_nonempty connectedComponent_nonempty
theorem connectedComponentIn_nonempty_iff {x : α} {F : Set α} :
(connectedComponentIn F x).Nonempty ↔ x ∈ F := by
rw [connectedComponentIn]
split_ifs <;> simp [connectedComponent_nonempty, *]
#align connected_component_in_nonempty_iff connectedComponentIn_nonempty_iff
theorem connectedComponentIn_subset (F : Set α) (x : α) : connectedComponentIn F x ⊆ F := by
rw [connectedComponentIn]
split_ifs <;> simp
#align connected_component_in_subset connectedComponentIn_subset
theorem isPreconnected_connectedComponent {x : α} : IsPreconnected (connectedComponent x) :=
isPreconnected_sUnion x _ (fun _ => And.right) fun _ => And.left
#align is_preconnected_connected_component isPreconnected_connectedComponent
theorem isPreconnected_connectedComponentIn {x : α} {F : Set α} :
IsPreconnected (connectedComponentIn F x) := by
rw [connectedComponentIn]; split_ifs
· exact inducing_subtype_val.isPreconnected_image.mpr isPreconnected_connectedComponent
· exact isPreconnected_empty
#align is_preconnected_connected_component_in isPreconnected_connectedComponentIn
theorem isConnected_connectedComponent {x : α} : IsConnected (connectedComponent x) :=
⟨⟨x, mem_connectedComponent⟩, isPreconnected_connectedComponent⟩
#align is_connected_connected_component isConnected_connectedComponent
theorem isConnected_connectedComponentIn_iff {x : α} {F : Set α} :
IsConnected (connectedComponentIn F x) ↔ x ∈ F := by
simp_rw [← connectedComponentIn_nonempty_iff, IsConnected, isPreconnected_connectedComponentIn,
and_true_iff]
#align is_connected_connected_component_in_iff isConnected_connectedComponentIn_iff
theorem IsPreconnected.subset_connectedComponent {x : α} {s : Set α} (H1 : IsPreconnected s)
(H2 : x ∈ s) : s ⊆ connectedComponent x := fun _z hz => mem_sUnion_of_mem hz ⟨H1, H2⟩
#align is_preconnected.subset_connected_component IsPreconnected.subset_connectedComponent
theorem IsPreconnected.subset_connectedComponentIn {x : α} {F : Set α} (hs : IsPreconnected s)
(hxs : x ∈ s) (hsF : s ⊆ F) : s ⊆ connectedComponentIn F x := by
have : IsPreconnected (((↑) : F → α) ⁻¹' s) := by
refine inducing_subtype_val.isPreconnected_image.mp ?_
rwa [Subtype.image_preimage_coe, inter_eq_right.mpr hsF]
have h2xs : (⟨x, hsF hxs⟩ : F) ∈ (↑) ⁻¹' s := by
rw [mem_preimage]
exact hxs
have := this.subset_connectedComponent h2xs
rw [connectedComponentIn_eq_image (hsF hxs)]
refine Subset.trans ?_ (image_subset _ this)
rw [Subtype.image_preimage_coe, inter_eq_right.mpr hsF]
#align is_preconnected.subset_connected_component_in IsPreconnected.subset_connectedComponentIn
theorem IsConnected.subset_connectedComponent {x : α} {s : Set α} (H1 : IsConnected s)
(H2 : x ∈ s) : s ⊆ connectedComponent x :=
H1.2.subset_connectedComponent H2
#align is_connected.subset_connected_component IsConnected.subset_connectedComponent
theorem IsPreconnected.connectedComponentIn {x : α} {F : Set α} (h : IsPreconnected F)
(hx : x ∈ F) : connectedComponentIn F x = F :=
(connectedComponentIn_subset F x).antisymm (h.subset_connectedComponentIn hx subset_rfl)
#align is_preconnected.connected_component_in IsPreconnected.connectedComponentIn
theorem connectedComponent_eq {x y : α} (h : y ∈ connectedComponent x) :
connectedComponent x = connectedComponent y :=
eq_of_subset_of_subset (isConnected_connectedComponent.subset_connectedComponent h)
(isConnected_connectedComponent.subset_connectedComponent
(Set.mem_of_mem_of_subset mem_connectedComponent
(isConnected_connectedComponent.subset_connectedComponent h)))
#align connected_component_eq connectedComponent_eq
theorem connectedComponent_eq_iff_mem {x y : α} :
connectedComponent x = connectedComponent y ↔ x ∈ connectedComponent y :=
⟨fun h => h ▸ mem_connectedComponent, fun h => (connectedComponent_eq h).symm⟩
#align connected_component_eq_iff_mem connectedComponent_eq_iff_mem
| Mathlib/Topology/Connected/Basic.lean | 678 | 683 | theorem connectedComponentIn_eq {x y : α} {F : Set α} (h : y ∈ connectedComponentIn F x) :
connectedComponentIn F x = connectedComponentIn F y := by |
have hx : x ∈ F := connectedComponentIn_nonempty_iff.mp ⟨y, h⟩
simp_rw [connectedComponentIn_eq_image hx] at h ⊢
obtain ⟨⟨y, hy⟩, h2y, rfl⟩ := h
simp_rw [connectedComponentIn_eq_image hy, connectedComponent_eq h2y]
|
import Mathlib.Data.Set.Lattice
#align_import data.set.intervals.disjoint from "leanprover-community/mathlib"@"207cfac9fcd06138865b5d04f7091e46d9320432"
universe u v w
variable {ι : Sort u} {α : Type v} {β : Type w}
open Set
open OrderDual (toDual)
namespace Set
section Preorder
variable [Preorder α] {a b c : α}
@[simp]
theorem Iic_disjoint_Ioi (h : a ≤ b) : Disjoint (Iic a) (Ioi b) :=
disjoint_left.mpr fun _ ha hb => (h.trans_lt hb).not_le ha
#align set.Iic_disjoint_Ioi Set.Iic_disjoint_Ioi
@[simp]
theorem Iio_disjoint_Ici (h : a ≤ b) : Disjoint (Iio a) (Ici b) :=
disjoint_left.mpr fun _ ha hb => (h.trans_lt' ha).not_le hb
@[simp]
theorem Iic_disjoint_Ioc (h : a ≤ b) : Disjoint (Iic a) (Ioc b c) :=
(Iic_disjoint_Ioi h).mono le_rfl Ioc_subset_Ioi_self
#align set.Iic_disjoint_Ioc Set.Iic_disjoint_Ioc
@[simp]
theorem Ioc_disjoint_Ioc_same : Disjoint (Ioc a b) (Ioc b c) :=
(Iic_disjoint_Ioc le_rfl).mono Ioc_subset_Iic_self le_rfl
#align set.Ioc_disjoint_Ioc_same Set.Ioc_disjoint_Ioc_same
@[simp]
theorem Ico_disjoint_Ico_same : Disjoint (Ico a b) (Ico b c) :=
disjoint_left.mpr fun _ hab hbc => hab.2.not_le hbc.1
#align set.Ico_disjoint_Ico_same Set.Ico_disjoint_Ico_same
@[simp]
theorem Ici_disjoint_Iic : Disjoint (Ici a) (Iic b) ↔ ¬a ≤ b := by
rw [Set.disjoint_iff_inter_eq_empty, Ici_inter_Iic, Icc_eq_empty_iff]
#align set.Ici_disjoint_Iic Set.Ici_disjoint_Iic
@[simp]
theorem Iic_disjoint_Ici : Disjoint (Iic a) (Ici b) ↔ ¬b ≤ a :=
disjoint_comm.trans Ici_disjoint_Iic
#align set.Iic_disjoint_Ici Set.Iic_disjoint_Ici
@[simp]
theorem Ioc_disjoint_Ioi (h : b ≤ c) : Disjoint (Ioc a b) (Ioi c) :=
disjoint_left.mpr (fun _ hx hy ↦ (hx.2.trans h).not_lt hy)
theorem Ioc_disjoint_Ioi_same : Disjoint (Ioc a b) (Ioi b) :=
Ioc_disjoint_Ioi le_rfl
@[simp]
theorem iUnion_Iic : ⋃ a : α, Iic a = univ :=
iUnion_eq_univ_iff.2 fun x => ⟨x, right_mem_Iic⟩
#align set.Union_Iic Set.iUnion_Iic
@[simp]
theorem iUnion_Ici : ⋃ a : α, Ici a = univ :=
iUnion_eq_univ_iff.2 fun x => ⟨x, left_mem_Ici⟩
#align set.Union_Ici Set.iUnion_Ici
@[simp]
theorem iUnion_Icc_right (a : α) : ⋃ b, Icc a b = Ici a := by
simp only [← Ici_inter_Iic, ← inter_iUnion, iUnion_Iic, inter_univ]
#align set.Union_Icc_right Set.iUnion_Icc_right
@[simp]
theorem iUnion_Ioc_right (a : α) : ⋃ b, Ioc a b = Ioi a := by
simp only [← Ioi_inter_Iic, ← inter_iUnion, iUnion_Iic, inter_univ]
#align set.Union_Ioc_right Set.iUnion_Ioc_right
@[simp]
theorem iUnion_Icc_left (b : α) : ⋃ a, Icc a b = Iic b := by
simp only [← Ici_inter_Iic, ← iUnion_inter, iUnion_Ici, univ_inter]
#align set.Union_Icc_left Set.iUnion_Icc_left
@[simp]
theorem iUnion_Ico_left (b : α) : ⋃ a, Ico a b = Iio b := by
simp only [← Ici_inter_Iio, ← iUnion_inter, iUnion_Ici, univ_inter]
#align set.Union_Ico_left Set.iUnion_Ico_left
@[simp]
theorem iUnion_Iio [NoMaxOrder α] : ⋃ a : α, Iio a = univ :=
iUnion_eq_univ_iff.2 exists_gt
#align set.Union_Iio Set.iUnion_Iio
@[simp]
theorem iUnion_Ioi [NoMinOrder α] : ⋃ a : α, Ioi a = univ :=
iUnion_eq_univ_iff.2 exists_lt
#align set.Union_Ioi Set.iUnion_Ioi
@[simp]
theorem iUnion_Ico_right [NoMaxOrder α] (a : α) : ⋃ b, Ico a b = Ici a := by
simp only [← Ici_inter_Iio, ← inter_iUnion, iUnion_Iio, inter_univ]
#align set.Union_Ico_right Set.iUnion_Ico_right
@[simp]
| Mathlib/Order/Interval/Set/Disjoint.lean | 122 | 123 | theorem iUnion_Ioo_right [NoMaxOrder α] (a : α) : ⋃ b, Ioo a b = Ioi a := by |
simp only [← Ioi_inter_Iio, ← inter_iUnion, iUnion_Iio, inter_univ]
|
import Mathlib.Data.Real.Sqrt
import Mathlib.Analysis.NormedSpace.Star.Basic
import Mathlib.Analysis.NormedSpace.ContinuousLinearMap
import Mathlib.Analysis.NormedSpace.Basic
#align_import data.is_R_or_C.basic from "leanprover-community/mathlib"@"baa88307f3e699fa7054ef04ec79fa4f056169cb"
section
local notation "𝓚" => algebraMap ℝ _
open ComplexConjugate
class RCLike (K : semiOutParam Type*) extends DenselyNormedField K, StarRing K,
NormedAlgebra ℝ K, CompleteSpace K where
re : K →+ ℝ
im : K →+ ℝ
I : K
I_re_ax : re I = 0
I_mul_I_ax : I = 0 ∨ I * I = -1
re_add_im_ax : ∀ z : K, 𝓚 (re z) + 𝓚 (im z) * I = z
ofReal_re_ax : ∀ r : ℝ, re (𝓚 r) = r
ofReal_im_ax : ∀ r : ℝ, im (𝓚 r) = 0
mul_re_ax : ∀ z w : K, re (z * w) = re z * re w - im z * im w
mul_im_ax : ∀ z w : K, im (z * w) = re z * im w + im z * re w
conj_re_ax : ∀ z : K, re (conj z) = re z
conj_im_ax : ∀ z : K, im (conj z) = -im z
conj_I_ax : conj I = -I
norm_sq_eq_def_ax : ∀ z : K, ‖z‖ ^ 2 = re z * re z + im z * im z
mul_im_I_ax : ∀ z : K, im z * im I = im z
[toPartialOrder : PartialOrder K]
le_iff_re_im {z w : K} : z ≤ w ↔ re z ≤ re w ∧ im z = im w
-- note we cannot put this in the `extends` clause
[toDecidableEq : DecidableEq K]
#align is_R_or_C RCLike
scoped[ComplexOrder] attribute [instance 100] RCLike.toPartialOrder
attribute [instance 100] RCLike.toDecidableEq
end
variable {K E : Type*} [RCLike K]
namespace RCLike
open ComplexConjugate
@[coe] abbrev ofReal : ℝ → K := Algebra.cast
noncomputable instance (priority := 900) algebraMapCoe : CoeTC ℝ K :=
⟨ofReal⟩
#align is_R_or_C.algebra_map_coe RCLike.algebraMapCoe
theorem ofReal_alg (x : ℝ) : (x : K) = x • (1 : K) :=
Algebra.algebraMap_eq_smul_one x
#align is_R_or_C.of_real_alg RCLike.ofReal_alg
theorem real_smul_eq_coe_mul (r : ℝ) (z : K) : r • z = (r : K) * z :=
Algebra.smul_def r z
#align is_R_or_C.real_smul_eq_coe_mul RCLike.real_smul_eq_coe_mul
theorem real_smul_eq_coe_smul [AddCommGroup E] [Module K E] [Module ℝ E] [IsScalarTower ℝ K E]
(r : ℝ) (x : E) : r • x = (r : K) • x := by rw [RCLike.ofReal_alg, smul_one_smul]
#align is_R_or_C.real_smul_eq_coe_smul RCLike.real_smul_eq_coe_smul
theorem algebraMap_eq_ofReal : ⇑(algebraMap ℝ K) = ofReal :=
rfl
#align is_R_or_C.algebra_map_eq_of_real RCLike.algebraMap_eq_ofReal
@[simp, rclike_simps]
theorem re_add_im (z : K) : (re z : K) + im z * I = z :=
RCLike.re_add_im_ax z
#align is_R_or_C.re_add_im RCLike.re_add_im
@[simp, norm_cast, rclike_simps]
theorem ofReal_re : ∀ r : ℝ, re (r : K) = r :=
RCLike.ofReal_re_ax
#align is_R_or_C.of_real_re RCLike.ofReal_re
@[simp, norm_cast, rclike_simps]
theorem ofReal_im : ∀ r : ℝ, im (r : K) = 0 :=
RCLike.ofReal_im_ax
#align is_R_or_C.of_real_im RCLike.ofReal_im
@[simp, rclike_simps]
theorem mul_re : ∀ z w : K, re (z * w) = re z * re w - im z * im w :=
RCLike.mul_re_ax
#align is_R_or_C.mul_re RCLike.mul_re
@[simp, rclike_simps]
theorem mul_im : ∀ z w : K, im (z * w) = re z * im w + im z * re w :=
RCLike.mul_im_ax
#align is_R_or_C.mul_im RCLike.mul_im
theorem ext_iff {z w : K} : z = w ↔ re z = re w ∧ im z = im w :=
⟨fun h => h ▸ ⟨rfl, rfl⟩, fun ⟨h₁, h₂⟩ => re_add_im z ▸ re_add_im w ▸ h₁ ▸ h₂ ▸ rfl⟩
#align is_R_or_C.ext_iff RCLike.ext_iff
theorem ext {z w : K} (hre : re z = re w) (him : im z = im w) : z = w :=
ext_iff.2 ⟨hre, him⟩
#align is_R_or_C.ext RCLike.ext
@[norm_cast]
theorem ofReal_zero : ((0 : ℝ) : K) = 0 :=
algebraMap.coe_zero
#align is_R_or_C.of_real_zero RCLike.ofReal_zero
@[rclike_simps]
theorem zero_re' : re (0 : K) = (0 : ℝ) :=
map_zero re
#align is_R_or_C.zero_re' RCLike.zero_re'
@[norm_cast]
theorem ofReal_one : ((1 : ℝ) : K) = 1 :=
map_one (algebraMap ℝ K)
#align is_R_or_C.of_real_one RCLike.ofReal_one
@[simp, rclike_simps]
theorem one_re : re (1 : K) = 1 := by rw [← ofReal_one, ofReal_re]
#align is_R_or_C.one_re RCLike.one_re
@[simp, rclike_simps]
theorem one_im : im (1 : K) = 0 := by rw [← ofReal_one, ofReal_im]
#align is_R_or_C.one_im RCLike.one_im
theorem ofReal_injective : Function.Injective ((↑) : ℝ → K) :=
(algebraMap ℝ K).injective
#align is_R_or_C.of_real_injective RCLike.ofReal_injective
@[norm_cast]
theorem ofReal_inj {z w : ℝ} : (z : K) = (w : K) ↔ z = w :=
algebraMap.coe_inj
#align is_R_or_C.of_real_inj RCLike.ofReal_inj
-- replaced by `RCLike.ofNat_re`
#noalign is_R_or_C.bit0_re
#noalign is_R_or_C.bit1_re
-- replaced by `RCLike.ofNat_im`
#noalign is_R_or_C.bit0_im
#noalign is_R_or_C.bit1_im
theorem ofReal_eq_zero {x : ℝ} : (x : K) = 0 ↔ x = 0 :=
algebraMap.lift_map_eq_zero_iff x
#align is_R_or_C.of_real_eq_zero RCLike.ofReal_eq_zero
theorem ofReal_ne_zero {x : ℝ} : (x : K) ≠ 0 ↔ x ≠ 0 :=
ofReal_eq_zero.not
#align is_R_or_C.of_real_ne_zero RCLike.ofReal_ne_zero
@[simp, rclike_simps, norm_cast]
theorem ofReal_add (r s : ℝ) : ((r + s : ℝ) : K) = r + s :=
algebraMap.coe_add _ _
#align is_R_or_C.of_real_add RCLike.ofReal_add
-- replaced by `RCLike.ofReal_ofNat`
#noalign is_R_or_C.of_real_bit0
#noalign is_R_or_C.of_real_bit1
@[simp, norm_cast, rclike_simps]
theorem ofReal_neg (r : ℝ) : ((-r : ℝ) : K) = -r :=
algebraMap.coe_neg r
#align is_R_or_C.of_real_neg RCLike.ofReal_neg
@[simp, norm_cast, rclike_simps]
theorem ofReal_sub (r s : ℝ) : ((r - s : ℝ) : K) = r - s :=
map_sub (algebraMap ℝ K) r s
#align is_R_or_C.of_real_sub RCLike.ofReal_sub
@[simp, rclike_simps, norm_cast]
theorem ofReal_sum {α : Type*} (s : Finset α) (f : α → ℝ) :
((∑ i ∈ s, f i : ℝ) : K) = ∑ i ∈ s, (f i : K) :=
map_sum (algebraMap ℝ K) _ _
#align is_R_or_C.of_real_sum RCLike.ofReal_sum
@[simp, rclike_simps, norm_cast]
theorem ofReal_finsupp_sum {α M : Type*} [Zero M] (f : α →₀ M) (g : α → M → ℝ) :
((f.sum fun a b => g a b : ℝ) : K) = f.sum fun a b => (g a b : K) :=
map_finsupp_sum (algebraMap ℝ K) f g
#align is_R_or_C.of_real_finsupp_sum RCLike.ofReal_finsupp_sum
@[simp, norm_cast, rclike_simps]
theorem ofReal_mul (r s : ℝ) : ((r * s : ℝ) : K) = r * s :=
algebraMap.coe_mul _ _
#align is_R_or_C.of_real_mul RCLike.ofReal_mul
@[simp, norm_cast, rclike_simps]
theorem ofReal_pow (r : ℝ) (n : ℕ) : ((r ^ n : ℝ) : K) = (r : K) ^ n :=
map_pow (algebraMap ℝ K) r n
#align is_R_or_C.of_real_pow RCLike.ofReal_pow
@[simp, rclike_simps, norm_cast]
theorem ofReal_prod {α : Type*} (s : Finset α) (f : α → ℝ) :
((∏ i ∈ s, f i : ℝ) : K) = ∏ i ∈ s, (f i : K) :=
map_prod (algebraMap ℝ K) _ _
#align is_R_or_C.of_real_prod RCLike.ofReal_prod
@[simp, rclike_simps, norm_cast]
theorem ofReal_finsupp_prod {α M : Type*} [Zero M] (f : α →₀ M) (g : α → M → ℝ) :
((f.prod fun a b => g a b : ℝ) : K) = f.prod fun a b => (g a b : K) :=
map_finsupp_prod _ f g
#align is_R_or_C.of_real_finsupp_prod RCLike.ofReal_finsupp_prod
@[simp, norm_cast, rclike_simps]
theorem real_smul_ofReal (r x : ℝ) : r • (x : K) = (r : K) * (x : K) :=
real_smul_eq_coe_mul _ _
#align is_R_or_C.real_smul_of_real RCLike.real_smul_ofReal
@[rclike_simps]
theorem re_ofReal_mul (r : ℝ) (z : K) : re (↑r * z) = r * re z := by
simp only [mul_re, ofReal_im, zero_mul, ofReal_re, sub_zero]
#align is_R_or_C.of_real_mul_re RCLike.re_ofReal_mul
@[rclike_simps]
theorem im_ofReal_mul (r : ℝ) (z : K) : im (↑r * z) = r * im z := by
simp only [add_zero, ofReal_im, zero_mul, ofReal_re, mul_im]
#align is_R_or_C.of_real_mul_im RCLike.im_ofReal_mul
@[rclike_simps]
theorem smul_re (r : ℝ) (z : K) : re (r • z) = r * re z := by
rw [real_smul_eq_coe_mul, re_ofReal_mul]
#align is_R_or_C.smul_re RCLike.smul_re
@[rclike_simps]
theorem smul_im (r : ℝ) (z : K) : im (r • z) = r * im z := by
rw [real_smul_eq_coe_mul, im_ofReal_mul]
#align is_R_or_C.smul_im RCLike.smul_im
@[simp, norm_cast, rclike_simps]
theorem norm_ofReal (r : ℝ) : ‖(r : K)‖ = |r| :=
norm_algebraMap' K r
#align is_R_or_C.norm_of_real RCLike.norm_ofReal
-- see Note [lower instance priority]
instance (priority := 100) charZero_rclike : CharZero K :=
(RingHom.charZero_iff (algebraMap ℝ K).injective).1 inferInstance
set_option linter.uppercaseLean3 false in
#align is_R_or_C.char_zero_R_or_C RCLike.charZero_rclike
@[simp, rclike_simps]
theorem I_re : re (I : K) = 0 :=
I_re_ax
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_re RCLike.I_re
@[simp, rclike_simps]
theorem I_im (z : K) : im z * im (I : K) = im z :=
mul_im_I_ax z
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_im RCLike.I_im
@[simp, rclike_simps]
theorem I_im' (z : K) : im (I : K) * im z = im z := by rw [mul_comm, I_im]
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_im' RCLike.I_im'
@[rclike_simps] -- porting note (#10618): was `simp`
theorem I_mul_re (z : K) : re (I * z) = -im z := by
simp only [I_re, zero_sub, I_im', zero_mul, mul_re]
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_mul_re RCLike.I_mul_re
theorem I_mul_I : (I : K) = 0 ∨ (I : K) * I = -1 :=
I_mul_I_ax
set_option linter.uppercaseLean3 false in
#align is_R_or_C.I_mul_I RCLike.I_mul_I
variable (𝕜) in
lemma I_eq_zero_or_im_I_eq_one : (I : K) = 0 ∨ im (I : K) = 1 :=
I_mul_I (K := K) |>.imp_right fun h ↦ by simpa [h] using (I_mul_re (I : K)).symm
@[simp, rclike_simps]
theorem conj_re (z : K) : re (conj z) = re z :=
RCLike.conj_re_ax z
#align is_R_or_C.conj_re RCLike.conj_re
@[simp, rclike_simps]
theorem conj_im (z : K) : im (conj z) = -im z :=
RCLike.conj_im_ax z
#align is_R_or_C.conj_im RCLike.conj_im
@[simp, rclike_simps]
theorem conj_I : conj (I : K) = -I :=
RCLike.conj_I_ax
set_option linter.uppercaseLean3 false in
#align is_R_or_C.conj_I RCLike.conj_I
@[simp, rclike_simps]
| Mathlib/Analysis/RCLike/Basic.lean | 337 | 339 | theorem conj_ofReal (r : ℝ) : conj (r : K) = (r : K) := by |
rw [ext_iff]
simp only [ofReal_im, conj_im, eq_self_iff_true, conj_re, and_self_iff, neg_zero]
|
import Mathlib.Probability.Notation
import Mathlib.Probability.Integration
import Mathlib.MeasureTheory.Function.L2Space
#align_import probability.variance from "leanprover-community/mathlib"@"f0c8bf9245297a541f468be517f1bde6195105e9"
open MeasureTheory Filter Finset
noncomputable section
open scoped MeasureTheory ProbabilityTheory ENNReal NNReal
namespace ProbabilityTheory
-- Porting note: this lemma replaces `ENNReal.toReal_bit0`, which does not exist in Lean 4
private lemma coe_two : ENNReal.toReal 2 = (2 : ℝ) := rfl
-- Porting note: Consider if `evariance` or `eVariance` is better. Also,
-- consider `eVariationOn` in `Mathlib.Analysis.BoundedVariation`.
def evariance {Ω : Type*} {_ : MeasurableSpace Ω} (X : Ω → ℝ) (μ : Measure Ω) : ℝ≥0∞ :=
∫⁻ ω, (‖X ω - μ[X]‖₊ : ℝ≥0∞) ^ 2 ∂μ
#align probability_theory.evariance ProbabilityTheory.evariance
def variance {Ω : Type*} {_ : MeasurableSpace Ω} (X : Ω → ℝ) (μ : Measure Ω) : ℝ :=
(evariance X μ).toReal
#align probability_theory.variance ProbabilityTheory.variance
variable {Ω : Type*} {m : MeasurableSpace Ω} {X : Ω → ℝ} {μ : Measure Ω}
theorem _root_.MeasureTheory.Memℒp.evariance_lt_top [IsFiniteMeasure μ] (hX : Memℒp X 2 μ) :
evariance X μ < ∞ := by
have := ENNReal.pow_lt_top (hX.sub <| memℒp_const <| μ[X]).2 2
rw [snorm_eq_lintegral_rpow_nnnorm two_ne_zero ENNReal.two_ne_top, ← ENNReal.rpow_two] at this
simp only [coe_two, Pi.sub_apply, ENNReal.one_toReal, one_div] at this
rw [← ENNReal.rpow_mul, inv_mul_cancel (two_ne_zero : (2 : ℝ) ≠ 0), ENNReal.rpow_one] at this
simp_rw [ENNReal.rpow_two] at this
exact this
#align measure_theory.mem_ℒp.evariance_lt_top MeasureTheory.Memℒp.evariance_lt_top
theorem evariance_eq_top [IsFiniteMeasure μ] (hXm : AEStronglyMeasurable X μ) (hX : ¬Memℒp X 2 μ) :
evariance X μ = ∞ := by
by_contra h
rw [← Ne, ← lt_top_iff_ne_top] at h
have : Memℒp (fun ω => X ω - μ[X]) 2 μ := by
refine ⟨hXm.sub aestronglyMeasurable_const, ?_⟩
rw [snorm_eq_lintegral_rpow_nnnorm two_ne_zero ENNReal.two_ne_top]
simp only [coe_two, ENNReal.one_toReal, ENNReal.rpow_two, Ne]
exact ENNReal.rpow_lt_top_of_nonneg (by linarith) h.ne
refine hX ?_
-- Porting note: `μ[X]` without whitespace is ambiguous as it could be GetElem,
-- and `convert` cannot disambiguate based on typeclass inference failure.
convert this.add (memℒp_const <| μ [X])
ext ω
rw [Pi.add_apply, sub_add_cancel]
#align probability_theory.evariance_eq_top ProbabilityTheory.evariance_eq_top
theorem evariance_lt_top_iff_memℒp [IsFiniteMeasure μ] (hX : AEStronglyMeasurable X μ) :
evariance X μ < ∞ ↔ Memℒp X 2 μ := by
refine ⟨?_, MeasureTheory.Memℒp.evariance_lt_top⟩
contrapose
rw [not_lt, top_le_iff]
exact evariance_eq_top hX
#align probability_theory.evariance_lt_top_iff_mem_ℒp ProbabilityTheory.evariance_lt_top_iff_memℒp
| Mathlib/Probability/Variance.lean | 100 | 103 | theorem _root_.MeasureTheory.Memℒp.ofReal_variance_eq [IsFiniteMeasure μ] (hX : Memℒp X 2 μ) :
ENNReal.ofReal (variance X μ) = evariance X μ := by |
rw [variance, ENNReal.ofReal_toReal]
exact hX.evariance_lt_top.ne
|
import Mathlib.Algebra.Order.Archimedean
import Mathlib.Order.Filter.AtTopBot
import Mathlib.Tactic.GCongr
#align_import order.filter.archimedean from "leanprover-community/mathlib"@"8631e2d5ea77f6c13054d9151d82b83069680cb1"
variable {α R : Type*}
open Filter Set Function
@[simp]
theorem Nat.comap_cast_atTop [StrictOrderedSemiring R] [Archimedean R] :
comap ((↑) : ℕ → R) atTop = atTop :=
comap_embedding_atTop (fun _ _ => Nat.cast_le) exists_nat_ge
#align nat.comap_coe_at_top Nat.comap_cast_atTop
theorem tendsto_natCast_atTop_iff [StrictOrderedSemiring R] [Archimedean R] {f : α → ℕ}
{l : Filter α} : Tendsto (fun n => (f n : R)) l atTop ↔ Tendsto f l atTop :=
tendsto_atTop_embedding (fun _ _ => Nat.cast_le) exists_nat_ge
#align tendsto_coe_nat_at_top_iff tendsto_natCast_atTop_iff
@[deprecated (since := "2024-04-17")]
alias tendsto_nat_cast_atTop_iff := tendsto_natCast_atTop_iff
theorem tendsto_natCast_atTop_atTop [OrderedSemiring R] [Archimedean R] :
Tendsto ((↑) : ℕ → R) atTop atTop :=
Nat.mono_cast.tendsto_atTop_atTop exists_nat_ge
#align tendsto_coe_nat_at_top_at_top tendsto_natCast_atTop_atTop
@[deprecated (since := "2024-04-17")]
alias tendsto_nat_cast_atTop_atTop := tendsto_natCast_atTop_atTop
theorem Filter.Eventually.natCast_atTop [OrderedSemiring R] [Archimedean R] {p : R → Prop}
(h : ∀ᶠ (x:R) in atTop, p x) : ∀ᶠ (n:ℕ) in atTop, p n :=
tendsto_natCast_atTop_atTop.eventually h
@[deprecated (since := "2024-04-17")]
alias Filter.Eventually.nat_cast_atTop := Filter.Eventually.natCast_atTop
@[simp] theorem Int.comap_cast_atTop [StrictOrderedRing R] [Archimedean R] :
comap ((↑) : ℤ → R) atTop = atTop :=
comap_embedding_atTop (fun _ _ => Int.cast_le) fun r =>
let ⟨n, hn⟩ := exists_nat_ge r; ⟨n, mod_cast hn⟩
#align int.comap_coe_at_top Int.comap_cast_atTop
@[simp]
theorem Int.comap_cast_atBot [StrictOrderedRing R] [Archimedean R] :
comap ((↑) : ℤ → R) atBot = atBot :=
comap_embedding_atBot (fun _ _ => Int.cast_le) fun r =>
let ⟨n, hn⟩ := exists_nat_ge (-r)
⟨-n, by simpa [neg_le] using hn⟩
#align int.comap_coe_at_bot Int.comap_cast_atBot
theorem tendsto_intCast_atTop_iff [StrictOrderedRing R] [Archimedean R] {f : α → ℤ}
{l : Filter α} : Tendsto (fun n => (f n : R)) l atTop ↔ Tendsto f l atTop := by
rw [← @Int.comap_cast_atTop R, tendsto_comap_iff]; rfl
#align tendsto_coe_int_at_top_iff tendsto_intCast_atTop_iff
@[deprecated (since := "2024-04-17")]
alias tendsto_int_cast_atTop_iff := tendsto_intCast_atTop_iff
theorem tendsto_intCast_atBot_iff [StrictOrderedRing R] [Archimedean R] {f : α → ℤ}
{l : Filter α} : Tendsto (fun n => (f n : R)) l atBot ↔ Tendsto f l atBot := by
rw [← @Int.comap_cast_atBot R, tendsto_comap_iff]; rfl
#align tendsto_coe_int_at_bot_iff tendsto_intCast_atBot_iff
@[deprecated (since := "2024-04-17")]
alias tendsto_int_cast_atBot_iff := tendsto_intCast_atBot_iff
theorem tendsto_intCast_atTop_atTop [StrictOrderedRing R] [Archimedean R] :
Tendsto ((↑) : ℤ → R) atTop atTop :=
tendsto_intCast_atTop_iff.2 tendsto_id
#align tendsto_coe_int_at_top_at_top tendsto_intCast_atTop_atTop
@[deprecated (since := "2024-04-17")]
alias tendsto_int_cast_atTop_atTop := tendsto_intCast_atTop_atTop
theorem Filter.Eventually.intCast_atTop [StrictOrderedRing R] [Archimedean R] {p : R → Prop}
(h : ∀ᶠ (x:R) in atTop, p x) : ∀ᶠ (n:ℤ) in atTop, p n := by
rw [← Int.comap_cast_atTop (R := R)]; exact h.comap _
@[deprecated (since := "2024-04-17")]
alias Filter.Eventually.int_cast_atTop := Filter.Eventually.intCast_atTop
theorem Filter.Eventually.intCast_atBot [StrictOrderedRing R] [Archimedean R] {p : R → Prop}
(h : ∀ᶠ (x:R) in atBot, p x) : ∀ᶠ (n:ℤ) in atBot, p n := by
rw [← Int.comap_cast_atBot (R := R)]; exact h.comap _
@[deprecated (since := "2024-04-17")]
alias Filter.Eventually.int_cast_atBot := Filter.Eventually.intCast_atBot
@[simp]
theorem Rat.comap_cast_atTop [LinearOrderedField R] [Archimedean R] :
comap ((↑) : ℚ → R) atTop = atTop :=
comap_embedding_atTop (fun _ _ => Rat.cast_le) fun r =>
let ⟨n, hn⟩ := exists_nat_ge r; ⟨n, by simpa⟩
#align rat.comap_coe_at_top Rat.comap_cast_atTop
@[simp] theorem Rat.comap_cast_atBot [LinearOrderedField R] [Archimedean R] :
comap ((↑) : ℚ → R) atBot = atBot :=
comap_embedding_atBot (fun _ _ => Rat.cast_le) fun r =>
let ⟨n, hn⟩ := exists_nat_ge (-r)
⟨-n, by simpa [neg_le]⟩
#align rat.comap_coe_at_bot Rat.comap_cast_atBot
theorem tendsto_ratCast_atTop_iff [LinearOrderedField R] [Archimedean R] {f : α → ℚ}
{l : Filter α} : Tendsto (fun n => (f n : R)) l atTop ↔ Tendsto f l atTop := by
rw [← @Rat.comap_cast_atTop R, tendsto_comap_iff]; rfl
#align tendsto_coe_rat_at_top_iff tendsto_ratCast_atTop_iff
@[deprecated (since := "2024-04-17")]
alias tendsto_rat_cast_atTop_iff := tendsto_ratCast_atTop_iff
| Mathlib/Order/Filter/Archimedean.lean | 129 | 131 | theorem tendsto_ratCast_atBot_iff [LinearOrderedField R] [Archimedean R] {f : α → ℚ}
{l : Filter α} : Tendsto (fun n => (f n : R)) l atBot ↔ Tendsto f l atBot := by |
rw [← @Rat.comap_cast_atBot R, tendsto_comap_iff]; rfl
|
import Mathlib.Data.ZMod.Quotient
#align_import group_theory.complement from "leanprover-community/mathlib"@"6ca1a09bc9aa75824bf97388c9e3b441fc4ccf3f"
open Set
open scoped Pointwise
namespace Subgroup
variable {G : Type*} [Group G] (H K : Subgroup G) (S T : Set G)
@[to_additive "`S` and `T` are complements if `(+) : S × T → G` is a bijection"]
def IsComplement : Prop :=
Function.Bijective fun x : S × T => x.1.1 * x.2.1
#align subgroup.is_complement Subgroup.IsComplement
#align add_subgroup.is_complement AddSubgroup.IsComplement
@[to_additive "`H` and `K` are complements if `(+) : H × K → G` is a bijection"]
abbrev IsComplement' :=
IsComplement (H : Set G) (K : Set G)
#align subgroup.is_complement' Subgroup.IsComplement'
#align add_subgroup.is_complement' AddSubgroup.IsComplement'
@[to_additive "The set of left-complements of `T : Set G`"]
def leftTransversals : Set (Set G) :=
{ S : Set G | IsComplement S T }
#align subgroup.left_transversals Subgroup.leftTransversals
#align add_subgroup.left_transversals AddSubgroup.leftTransversals
@[to_additive "The set of right-complements of `S : Set G`"]
def rightTransversals : Set (Set G) :=
{ T : Set G | IsComplement S T }
#align subgroup.right_transversals Subgroup.rightTransversals
#align add_subgroup.right_transversals AddSubgroup.rightTransversals
variable {H K S T}
@[to_additive]
theorem isComplement'_def : IsComplement' H K ↔ IsComplement (H : Set G) (K : Set G) :=
Iff.rfl
#align subgroup.is_complement'_def Subgroup.isComplement'_def
#align add_subgroup.is_complement'_def AddSubgroup.isComplement'_def
@[to_additive]
theorem isComplement_iff_existsUnique :
IsComplement S T ↔ ∀ g : G, ∃! x : S × T, x.1.1 * x.2.1 = g :=
Function.bijective_iff_existsUnique _
#align subgroup.is_complement_iff_exists_unique Subgroup.isComplement_iff_existsUnique
#align add_subgroup.is_complement_iff_exists_unique AddSubgroup.isComplement_iff_existsUnique
@[to_additive]
theorem IsComplement.existsUnique (h : IsComplement S T) (g : G) :
∃! x : S × T, x.1.1 * x.2.1 = g :=
isComplement_iff_existsUnique.mp h g
#align subgroup.is_complement.exists_unique Subgroup.IsComplement.existsUnique
#align add_subgroup.is_complement.exists_unique AddSubgroup.IsComplement.existsUnique
@[to_additive]
theorem IsComplement'.symm (h : IsComplement' H K) : IsComplement' K H := by
let ϕ : H × K ≃ K × H :=
Equiv.mk (fun x => ⟨x.2⁻¹, x.1⁻¹⟩) (fun x => ⟨x.2⁻¹, x.1⁻¹⟩)
(fun x => Prod.ext (inv_inv _) (inv_inv _)) fun x => Prod.ext (inv_inv _) (inv_inv _)
let ψ : G ≃ G := Equiv.mk (fun g : G => g⁻¹) (fun g : G => g⁻¹) inv_inv inv_inv
suffices hf : (ψ ∘ fun x : H × K => x.1.1 * x.2.1) = (fun x : K × H => x.1.1 * x.2.1) ∘ ϕ by
rw [isComplement'_def, IsComplement, ← Equiv.bijective_comp ϕ]
apply (congr_arg Function.Bijective hf).mp -- Porting note: This was a `rw` in mathlib3
rwa [ψ.comp_bijective]
exact funext fun x => mul_inv_rev _ _
#align subgroup.is_complement'.symm Subgroup.IsComplement'.symm
#align add_subgroup.is_complement'.symm AddSubgroup.IsComplement'.symm
@[to_additive]
theorem isComplement'_comm : IsComplement' H K ↔ IsComplement' K H :=
⟨IsComplement'.symm, IsComplement'.symm⟩
#align subgroup.is_complement'_comm Subgroup.isComplement'_comm
#align add_subgroup.is_complement'_comm AddSubgroup.isComplement'_comm
@[to_additive]
theorem isComplement_univ_singleton {g : G} : IsComplement (univ : Set G) {g} :=
⟨fun ⟨_, _, rfl⟩ ⟨_, _, rfl⟩ h => Prod.ext (Subtype.ext (mul_right_cancel h)) rfl, fun x =>
⟨⟨⟨x * g⁻¹, ⟨⟩⟩, g, rfl⟩, inv_mul_cancel_right x g⟩⟩
#align subgroup.is_complement_top_singleton Subgroup.isComplement_univ_singleton
#align add_subgroup.is_complement_top_singleton AddSubgroup.isComplement_univ_singleton
@[to_additive]
theorem isComplement_singleton_univ {g : G} : IsComplement ({g} : Set G) univ :=
⟨fun ⟨⟨_, rfl⟩, _⟩ ⟨⟨_, rfl⟩, _⟩ h => Prod.ext rfl (Subtype.ext (mul_left_cancel h)), fun x =>
⟨⟨⟨g, rfl⟩, g⁻¹ * x, ⟨⟩⟩, mul_inv_cancel_left g x⟩⟩
#align subgroup.is_complement_singleton_top Subgroup.isComplement_singleton_univ
#align add_subgroup.is_complement_singleton_top AddSubgroup.isComplement_singleton_univ
@[to_additive]
theorem isComplement_singleton_left {g : G} : IsComplement {g} S ↔ S = univ := by
refine
⟨fun h => top_le_iff.mp fun x _ => ?_, fun h => (congr_arg _ h).mpr isComplement_singleton_univ⟩
obtain ⟨⟨⟨z, rfl : z = g⟩, y, _⟩, hy⟩ := h.2 (g * x)
rwa [← mul_left_cancel hy]
#align subgroup.is_complement_singleton_left Subgroup.isComplement_singleton_left
#align add_subgroup.is_complement_singleton_left AddSubgroup.isComplement_singleton_left
@[to_additive]
theorem isComplement_singleton_right {g : G} : IsComplement S {g} ↔ S = univ := by
refine
⟨fun h => top_le_iff.mp fun x _ => ?_, fun h => h ▸ isComplement_univ_singleton⟩
obtain ⟨y, hy⟩ := h.2 (x * g)
conv_rhs at hy => rw [← show y.2.1 = g from y.2.2]
rw [← mul_right_cancel hy]
exact y.1.2
#align subgroup.is_complement_singleton_right Subgroup.isComplement_singleton_right
#align add_subgroup.is_complement_singleton_right AddSubgroup.isComplement_singleton_right
@[to_additive]
theorem isComplement_univ_left : IsComplement univ S ↔ ∃ g : G, S = {g} := by
refine
⟨fun h => Set.exists_eq_singleton_iff_nonempty_subsingleton.mpr ⟨?_, fun a ha b hb => ?_⟩, ?_⟩
· obtain ⟨a, _⟩ := h.2 1
exact ⟨a.2.1, a.2.2⟩
· have : (⟨⟨_, mem_top a⁻¹⟩, ⟨a, ha⟩⟩ : (⊤ : Set G) × S) = ⟨⟨_, mem_top b⁻¹⟩, ⟨b, hb⟩⟩ :=
h.1 ((inv_mul_self a).trans (inv_mul_self b).symm)
exact Subtype.ext_iff.mp (Prod.ext_iff.mp this).2
· rintro ⟨g, rfl⟩
exact isComplement_univ_singleton
#align subgroup.is_complement_top_left Subgroup.isComplement_univ_left
#align add_subgroup.is_complement_top_left AddSubgroup.isComplement_univ_left
@[to_additive]
theorem isComplement_univ_right : IsComplement S univ ↔ ∃ g : G, S = {g} := by
refine
⟨fun h => Set.exists_eq_singleton_iff_nonempty_subsingleton.mpr ⟨?_, fun a ha b hb => ?_⟩, ?_⟩
· obtain ⟨a, _⟩ := h.2 1
exact ⟨a.1.1, a.1.2⟩
· have : (⟨⟨a, ha⟩, ⟨_, mem_top a⁻¹⟩⟩ : S × (⊤ : Set G)) = ⟨⟨b, hb⟩, ⟨_, mem_top b⁻¹⟩⟩ :=
h.1 ((mul_inv_self a).trans (mul_inv_self b).symm)
exact Subtype.ext_iff.mp (Prod.ext_iff.mp this).1
· rintro ⟨g, rfl⟩
exact isComplement_singleton_univ
#align subgroup.is_complement_top_right Subgroup.isComplement_univ_right
#align add_subgroup.is_complement_top_right AddSubgroup.isComplement_univ_right
@[to_additive]
lemma IsComplement.mul_eq (h : IsComplement S T) : S * T = univ :=
eq_univ_of_forall fun x ↦ by simpa [mem_mul] using (h.existsUnique x).exists
@[to_additive AddSubgroup.IsComplement.card_mul_card]
lemma IsComplement.card_mul_card (h : IsComplement S T) : Nat.card S * Nat.card T = Nat.card G :=
(Nat.card_prod _ _).symm.trans <| Nat.card_congr <| Equiv.ofBijective _ h
@[to_additive]
theorem isComplement'_top_bot : IsComplement' (⊤ : Subgroup G) ⊥ :=
isComplement_univ_singleton
#align subgroup.is_complement'_top_bot Subgroup.isComplement'_top_bot
#align add_subgroup.is_complement'_top_bot AddSubgroup.isComplement'_top_bot
@[to_additive]
theorem isComplement'_bot_top : IsComplement' (⊥ : Subgroup G) ⊤ :=
isComplement_singleton_univ
#align subgroup.is_complement'_bot_top Subgroup.isComplement'_bot_top
#align add_subgroup.is_complement'_bot_top AddSubgroup.isComplement'_bot_top
@[to_additive (attr := simp)]
theorem isComplement'_bot_left : IsComplement' ⊥ H ↔ H = ⊤ :=
isComplement_singleton_left.trans coe_eq_univ
#align subgroup.is_complement'_bot_left Subgroup.isComplement'_bot_left
#align add_subgroup.is_complement'_bot_left AddSubgroup.isComplement'_bot_left
@[to_additive (attr := simp)]
theorem isComplement'_bot_right : IsComplement' H ⊥ ↔ H = ⊤ :=
isComplement_singleton_right.trans coe_eq_univ
#align subgroup.is_complement'_bot_right Subgroup.isComplement'_bot_right
#align add_subgroup.is_complement'_bot_right AddSubgroup.isComplement'_bot_right
@[to_additive (attr := simp)]
theorem isComplement'_top_left : IsComplement' ⊤ H ↔ H = ⊥ :=
isComplement_univ_left.trans coe_eq_singleton
#align subgroup.is_complement'_top_left Subgroup.isComplement'_top_left
#align add_subgroup.is_complement'_top_left AddSubgroup.isComplement'_top_left
@[to_additive (attr := simp)]
theorem isComplement'_top_right : IsComplement' H ⊤ ↔ H = ⊥ :=
isComplement_univ_right.trans coe_eq_singleton
#align subgroup.is_complement'_top_right Subgroup.isComplement'_top_right
#align add_subgroup.is_complement'_top_right AddSubgroup.isComplement'_top_right
@[to_additive]
| Mathlib/GroupTheory/Complement.lean | 216 | 227 | theorem mem_leftTransversals_iff_existsUnique_inv_mul_mem :
S ∈ leftTransversals T ↔ ∀ g : G, ∃! s : S, (s : G)⁻¹ * g ∈ T := by |
rw [leftTransversals, Set.mem_setOf_eq, isComplement_iff_existsUnique]
refine ⟨fun h g => ?_, fun h g => ?_⟩
· obtain ⟨x, h1, h2⟩ := h g
exact
⟨x.1, (congr_arg (· ∈ T) (eq_inv_mul_of_mul_eq h1)).mp x.2.2, fun y hy =>
(Prod.ext_iff.mp (h2 ⟨y, (↑y)⁻¹ * g, hy⟩ (mul_inv_cancel_left ↑y g))).1⟩
· obtain ⟨x, h1, h2⟩ := h g
refine ⟨⟨x, (↑x)⁻¹ * g, h1⟩, mul_inv_cancel_left (↑x) g, fun y hy => ?_⟩
have hf := h2 y.1 ((congr_arg (· ∈ T) (eq_inv_mul_of_mul_eq hy)).mp y.2.2)
exact Prod.ext hf (Subtype.ext (eq_inv_mul_of_mul_eq (hf ▸ hy)))
|
import Mathlib.Topology.UniformSpace.UniformConvergenceTopology
#align_import topology.uniform_space.equicontinuity from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982"
section
open UniformSpace Filter Set Uniformity Topology UniformConvergence Function
variable {ι κ X X' Y Z α α' β β' γ 𝓕 : Type*} [tX : TopologicalSpace X] [tY : TopologicalSpace Y]
[tZ : TopologicalSpace Z] [uα : UniformSpace α] [uβ : UniformSpace β] [uγ : UniformSpace γ]
def EquicontinuousAt (F : ι → X → α) (x₀ : X) : Prop :=
∀ U ∈ 𝓤 α, ∀ᶠ x in 𝓝 x₀, ∀ i, (F i x₀, F i x) ∈ U
#align equicontinuous_at EquicontinuousAt
protected abbrev Set.EquicontinuousAt (H : Set <| X → α) (x₀ : X) : Prop :=
EquicontinuousAt ((↑) : H → X → α) x₀
#align set.equicontinuous_at Set.EquicontinuousAt
def EquicontinuousWithinAt (F : ι → X → α) (S : Set X) (x₀ : X) : Prop :=
∀ U ∈ 𝓤 α, ∀ᶠ x in 𝓝[S] x₀, ∀ i, (F i x₀, F i x) ∈ U
protected abbrev Set.EquicontinuousWithinAt (H : Set <| X → α) (S : Set X) (x₀ : X) : Prop :=
EquicontinuousWithinAt ((↑) : H → X → α) S x₀
def Equicontinuous (F : ι → X → α) : Prop :=
∀ x₀, EquicontinuousAt F x₀
#align equicontinuous Equicontinuous
protected abbrev Set.Equicontinuous (H : Set <| X → α) : Prop :=
Equicontinuous ((↑) : H → X → α)
#align set.equicontinuous Set.Equicontinuous
def EquicontinuousOn (F : ι → X → α) (S : Set X) : Prop :=
∀ x₀ ∈ S, EquicontinuousWithinAt F S x₀
protected abbrev Set.EquicontinuousOn (H : Set <| X → α) (S : Set X) : Prop :=
EquicontinuousOn ((↑) : H → X → α) S
def UniformEquicontinuous (F : ι → β → α) : Prop :=
∀ U ∈ 𝓤 α, ∀ᶠ xy : β × β in 𝓤 β, ∀ i, (F i xy.1, F i xy.2) ∈ U
#align uniform_equicontinuous UniformEquicontinuous
protected abbrev Set.UniformEquicontinuous (H : Set <| β → α) : Prop :=
UniformEquicontinuous ((↑) : H → β → α)
#align set.uniform_equicontinuous Set.UniformEquicontinuous
def UniformEquicontinuousOn (F : ι → β → α) (S : Set β) : Prop :=
∀ U ∈ 𝓤 α, ∀ᶠ xy : β × β in 𝓤 β ⊓ 𝓟 (S ×ˢ S), ∀ i, (F i xy.1, F i xy.2) ∈ U
protected abbrev Set.UniformEquicontinuousOn (H : Set <| β → α) (S : Set β) : Prop :=
UniformEquicontinuousOn ((↑) : H → β → α) S
lemma EquicontinuousAt.equicontinuousWithinAt {F : ι → X → α} {x₀ : X} (H : EquicontinuousAt F x₀)
(S : Set X) : EquicontinuousWithinAt F S x₀ :=
fun U hU ↦ (H U hU).filter_mono inf_le_left
lemma EquicontinuousWithinAt.mono {F : ι → X → α} {x₀ : X} {S T : Set X}
(H : EquicontinuousWithinAt F T x₀) (hST : S ⊆ T) : EquicontinuousWithinAt F S x₀ :=
fun U hU ↦ (H U hU).filter_mono <| nhdsWithin_mono x₀ hST
@[simp] lemma equicontinuousWithinAt_univ (F : ι → X → α) (x₀ : X) :
EquicontinuousWithinAt F univ x₀ ↔ EquicontinuousAt F x₀ := by
rw [EquicontinuousWithinAt, EquicontinuousAt, nhdsWithin_univ]
lemma equicontinuousAt_restrict_iff (F : ι → X → α) {S : Set X} (x₀ : S) :
EquicontinuousAt (S.restrict ∘ F) x₀ ↔ EquicontinuousWithinAt F S x₀ := by
simp [EquicontinuousWithinAt, EquicontinuousAt,
← eventually_nhds_subtype_iff]
lemma Equicontinuous.equicontinuousOn {F : ι → X → α} (H : Equicontinuous F)
(S : Set X) : EquicontinuousOn F S :=
fun x _ ↦ (H x).equicontinuousWithinAt S
lemma EquicontinuousOn.mono {F : ι → X → α} {S T : Set X}
(H : EquicontinuousOn F T) (hST : S ⊆ T) : EquicontinuousOn F S :=
fun x hx ↦ (H x (hST hx)).mono hST
lemma equicontinuousOn_univ (F : ι → X → α) :
EquicontinuousOn F univ ↔ Equicontinuous F := by
simp [EquicontinuousOn, Equicontinuous]
lemma equicontinuous_restrict_iff (F : ι → X → α) {S : Set X} :
Equicontinuous (S.restrict ∘ F) ↔ EquicontinuousOn F S := by
simp [Equicontinuous, EquicontinuousOn, equicontinuousAt_restrict_iff]
lemma UniformEquicontinuous.uniformEquicontinuousOn {F : ι → β → α} (H : UniformEquicontinuous F)
(S : Set β) : UniformEquicontinuousOn F S :=
fun U hU ↦ (H U hU).filter_mono inf_le_left
lemma UniformEquicontinuousOn.mono {F : ι → β → α} {S T : Set β}
(H : UniformEquicontinuousOn F T) (hST : S ⊆ T) : UniformEquicontinuousOn F S :=
fun U hU ↦ (H U hU).filter_mono <| by gcongr
lemma uniformEquicontinuousOn_univ (F : ι → β → α) :
UniformEquicontinuousOn F univ ↔ UniformEquicontinuous F := by
simp [UniformEquicontinuousOn, UniformEquicontinuous]
lemma uniformEquicontinuous_restrict_iff (F : ι → β → α) {S : Set β} :
UniformEquicontinuous (S.restrict ∘ F) ↔ UniformEquicontinuousOn F S := by
rw [UniformEquicontinuous, UniformEquicontinuousOn]
conv in _ ⊓ _ => rw [← Subtype.range_val (s := S), ← range_prod_map, ← map_comap]
rfl
@[simp]
lemma equicontinuousAt_empty [h : IsEmpty ι] (F : ι → X → α) (x₀ : X) :
EquicontinuousAt F x₀ :=
fun _ _ ↦ eventually_of_forall (fun _ ↦ h.elim)
@[simp]
lemma equicontinuousWithinAt_empty [h : IsEmpty ι] (F : ι → X → α) (S : Set X) (x₀ : X) :
EquicontinuousWithinAt F S x₀ :=
fun _ _ ↦ eventually_of_forall (fun _ ↦ h.elim)
@[simp]
lemma equicontinuous_empty [IsEmpty ι] (F : ι → X → α) :
Equicontinuous F :=
equicontinuousAt_empty F
@[simp]
lemma equicontinuousOn_empty [IsEmpty ι] (F : ι → X → α) (S : Set X) :
EquicontinuousOn F S :=
fun x₀ _ ↦ equicontinuousWithinAt_empty F S x₀
@[simp]
lemma uniformEquicontinuous_empty [h : IsEmpty ι] (F : ι → β → α) :
UniformEquicontinuous F :=
fun _ _ ↦ eventually_of_forall (fun _ ↦ h.elim)
@[simp]
lemma uniformEquicontinuousOn_empty [h : IsEmpty ι] (F : ι → β → α) (S : Set β) :
UniformEquicontinuousOn F S :=
fun _ _ ↦ eventually_of_forall (fun _ ↦ h.elim)
theorem equicontinuousAt_finite [Finite ι] {F : ι → X → α} {x₀ : X} :
EquicontinuousAt F x₀ ↔ ∀ i, ContinuousAt (F i) x₀ := by
simp [EquicontinuousAt, ContinuousAt, (nhds_basis_uniformity' (𝓤 α).basis_sets).tendsto_right_iff,
UniformSpace.ball, @forall_swap _ ι]
theorem equicontinuousWithinAt_finite [Finite ι] {F : ι → X → α} {S : Set X} {x₀ : X} :
EquicontinuousWithinAt F S x₀ ↔ ∀ i, ContinuousWithinAt (F i) S x₀ := by
simp [EquicontinuousWithinAt, ContinuousWithinAt,
(nhds_basis_uniformity' (𝓤 α).basis_sets).tendsto_right_iff, UniformSpace.ball,
@forall_swap _ ι]
| Mathlib/Topology/UniformSpace/Equicontinuity.lean | 262 | 264 | theorem equicontinuous_finite [Finite ι] {F : ι → X → α} :
Equicontinuous F ↔ ∀ i, Continuous (F i) := by |
simp only [Equicontinuous, equicontinuousAt_finite, continuous_iff_continuousAt, @forall_swap ι]
|
import Mathlib.Data.Set.Image
import Mathlib.Order.SuccPred.Relation
import Mathlib.Topology.Clopen
import Mathlib.Topology.Irreducible
#align_import topology.connected from "leanprover-community/mathlib"@"d101e93197bb5f6ea89bd7ba386b7f7dff1f3903"
open Set Function Topology TopologicalSpace Relation
open scoped Classical
universe u v
variable {α : Type u} {β : Type v} {ι : Type*} {π : ι → Type*} [TopologicalSpace α]
{s t u v : Set α}
section Preconnected
def IsPreconnected (s : Set α) : Prop :=
∀ u v : Set α, IsOpen u → IsOpen v → s ⊆ u ∪ v → (s ∩ u).Nonempty → (s ∩ v).Nonempty →
(s ∩ (u ∩ v)).Nonempty
#align is_preconnected IsPreconnected
def IsConnected (s : Set α) : Prop :=
s.Nonempty ∧ IsPreconnected s
#align is_connected IsConnected
theorem IsConnected.nonempty {s : Set α} (h : IsConnected s) : s.Nonempty :=
h.1
#align is_connected.nonempty IsConnected.nonempty
theorem IsConnected.isPreconnected {s : Set α} (h : IsConnected s) : IsPreconnected s :=
h.2
#align is_connected.is_preconnected IsConnected.isPreconnected
theorem IsPreirreducible.isPreconnected {s : Set α} (H : IsPreirreducible s) : IsPreconnected s :=
fun _ _ hu hv _ => H _ _ hu hv
#align is_preirreducible.is_preconnected IsPreirreducible.isPreconnected
theorem IsIrreducible.isConnected {s : Set α} (H : IsIrreducible s) : IsConnected s :=
⟨H.nonempty, H.isPreirreducible.isPreconnected⟩
#align is_irreducible.is_connected IsIrreducible.isConnected
theorem isPreconnected_empty : IsPreconnected (∅ : Set α) :=
isPreirreducible_empty.isPreconnected
#align is_preconnected_empty isPreconnected_empty
theorem isConnected_singleton {x} : IsConnected ({x} : Set α) :=
isIrreducible_singleton.isConnected
#align is_connected_singleton isConnected_singleton
theorem isPreconnected_singleton {x} : IsPreconnected ({x} : Set α) :=
isConnected_singleton.isPreconnected
#align is_preconnected_singleton isPreconnected_singleton
theorem Set.Subsingleton.isPreconnected {s : Set α} (hs : s.Subsingleton) : IsPreconnected s :=
hs.induction_on isPreconnected_empty fun _ => isPreconnected_singleton
#align set.subsingleton.is_preconnected Set.Subsingleton.isPreconnected
theorem isPreconnected_of_forall {s : Set α} (x : α)
(H : ∀ y ∈ s, ∃ t, t ⊆ s ∧ x ∈ t ∧ y ∈ t ∧ IsPreconnected t) : IsPreconnected s := by
rintro u v hu hv hs ⟨z, zs, zu⟩ ⟨y, ys, yv⟩
have xs : x ∈ s := by
rcases H y ys with ⟨t, ts, xt, -, -⟩
exact ts xt
-- Porting note (#11215): TODO: use `wlog xu : x ∈ u := hs xs using u v y z, v u z y`
cases hs xs with
| inl xu =>
rcases H y ys with ⟨t, ts, xt, yt, ht⟩
have := ht u v hu hv (ts.trans hs) ⟨x, xt, xu⟩ ⟨y, yt, yv⟩
exact this.imp fun z hz => ⟨ts hz.1, hz.2⟩
| inr xv =>
rcases H z zs with ⟨t, ts, xt, zt, ht⟩
have := ht v u hv hu (ts.trans <| by rwa [union_comm]) ⟨x, xt, xv⟩ ⟨z, zt, zu⟩
exact this.imp fun _ h => ⟨ts h.1, h.2.2, h.2.1⟩
#align is_preconnected_of_forall isPreconnected_of_forall
theorem isPreconnected_of_forall_pair {s : Set α}
(H : ∀ x ∈ s, ∀ y ∈ s, ∃ t, t ⊆ s ∧ x ∈ t ∧ y ∈ t ∧ IsPreconnected t) :
IsPreconnected s := by
rcases eq_empty_or_nonempty s with (rfl | ⟨x, hx⟩)
exacts [isPreconnected_empty, isPreconnected_of_forall x fun y => H x hx y]
#align is_preconnected_of_forall_pair isPreconnected_of_forall_pair
theorem isPreconnected_sUnion (x : α) (c : Set (Set α)) (H1 : ∀ s ∈ c, x ∈ s)
(H2 : ∀ s ∈ c, IsPreconnected s) : IsPreconnected (⋃₀ c) := by
apply isPreconnected_of_forall x
rintro y ⟨s, sc, ys⟩
exact ⟨s, subset_sUnion_of_mem sc, H1 s sc, ys, H2 s sc⟩
#align is_preconnected_sUnion isPreconnected_sUnion
theorem isPreconnected_iUnion {ι : Sort*} {s : ι → Set α} (h₁ : (⋂ i, s i).Nonempty)
(h₂ : ∀ i, IsPreconnected (s i)) : IsPreconnected (⋃ i, s i) :=
Exists.elim h₁ fun f hf => isPreconnected_sUnion f _ hf (forall_mem_range.2 h₂)
#align is_preconnected_Union isPreconnected_iUnion
theorem IsPreconnected.union (x : α) {s t : Set α} (H1 : x ∈ s) (H2 : x ∈ t) (H3 : IsPreconnected s)
(H4 : IsPreconnected t) : IsPreconnected (s ∪ t) :=
sUnion_pair s t ▸ isPreconnected_sUnion x {s, t} (by rintro r (rfl | rfl | h) <;> assumption)
(by rintro r (rfl | rfl | h) <;> assumption)
#align is_preconnected.union IsPreconnected.union
theorem IsPreconnected.union' {s t : Set α} (H : (s ∩ t).Nonempty) (hs : IsPreconnected s)
(ht : IsPreconnected t) : IsPreconnected (s ∪ t) := by
rcases H with ⟨x, hxs, hxt⟩
exact hs.union x hxs hxt ht
#align is_preconnected.union' IsPreconnected.union'
theorem IsConnected.union {s t : Set α} (H : (s ∩ t).Nonempty) (Hs : IsConnected s)
(Ht : IsConnected t) : IsConnected (s ∪ t) := by
rcases H with ⟨x, hx⟩
refine ⟨⟨x, mem_union_left t (mem_of_mem_inter_left hx)⟩, ?_⟩
exact Hs.isPreconnected.union x (mem_of_mem_inter_left hx) (mem_of_mem_inter_right hx)
Ht.isPreconnected
#align is_connected.union IsConnected.union
theorem IsPreconnected.sUnion_directed {S : Set (Set α)} (K : DirectedOn (· ⊆ ·) S)
(H : ∀ s ∈ S, IsPreconnected s) : IsPreconnected (⋃₀ S) := by
rintro u v hu hv Huv ⟨a, ⟨s, hsS, has⟩, hau⟩ ⟨b, ⟨t, htS, hbt⟩, hbv⟩
obtain ⟨r, hrS, hsr, htr⟩ : ∃ r ∈ S, s ⊆ r ∧ t ⊆ r := K s hsS t htS
have Hnuv : (r ∩ (u ∩ v)).Nonempty :=
H _ hrS u v hu hv ((subset_sUnion_of_mem hrS).trans Huv) ⟨a, hsr has, hau⟩ ⟨b, htr hbt, hbv⟩
have Kruv : r ∩ (u ∩ v) ⊆ ⋃₀ S ∩ (u ∩ v) := inter_subset_inter_left _ (subset_sUnion_of_mem hrS)
exact Hnuv.mono Kruv
#align is_preconnected.sUnion_directed IsPreconnected.sUnion_directed
theorem IsPreconnected.biUnion_of_reflTransGen {ι : Type*} {t : Set ι} {s : ι → Set α}
(H : ∀ i ∈ t, IsPreconnected (s i))
(K : ∀ i, i ∈ t → ∀ j, j ∈ t → ReflTransGen (fun i j => (s i ∩ s j).Nonempty ∧ i ∈ t) i j) :
IsPreconnected (⋃ n ∈ t, s n) := by
let R := fun i j : ι => (s i ∩ s j).Nonempty ∧ i ∈ t
have P : ∀ i, i ∈ t → ∀ j, j ∈ t → ReflTransGen R i j →
∃ p, p ⊆ t ∧ i ∈ p ∧ j ∈ p ∧ IsPreconnected (⋃ j ∈ p, s j) := fun i hi j hj h => by
induction h with
| refl =>
refine ⟨{i}, singleton_subset_iff.mpr hi, mem_singleton i, mem_singleton i, ?_⟩
rw [biUnion_singleton]
exact H i hi
| @tail j k _ hjk ih =>
obtain ⟨p, hpt, hip, hjp, hp⟩ := ih hjk.2
refine ⟨insert k p, insert_subset_iff.mpr ⟨hj, hpt⟩, mem_insert_of_mem k hip,
mem_insert k p, ?_⟩
rw [biUnion_insert]
refine (H k hj).union' (hjk.1.mono ?_) hp
rw [inter_comm]
exact inter_subset_inter_right _ (subset_biUnion_of_mem hjp)
refine isPreconnected_of_forall_pair ?_
intro x hx y hy
obtain ⟨i : ι, hi : i ∈ t, hxi : x ∈ s i⟩ := mem_iUnion₂.1 hx
obtain ⟨j : ι, hj : j ∈ t, hyj : y ∈ s j⟩ := mem_iUnion₂.1 hy
obtain ⟨p, hpt, hip, hjp, hp⟩ := P i hi j hj (K i hi j hj)
exact ⟨⋃ j ∈ p, s j, biUnion_subset_biUnion_left hpt, mem_biUnion hip hxi,
mem_biUnion hjp hyj, hp⟩
#align is_preconnected.bUnion_of_refl_trans_gen IsPreconnected.biUnion_of_reflTransGen
theorem IsConnected.biUnion_of_reflTransGen {ι : Type*} {t : Set ι} {s : ι → Set α}
(ht : t.Nonempty) (H : ∀ i ∈ t, IsConnected (s i))
(K : ∀ i, i ∈ t → ∀ j, j ∈ t → ReflTransGen (fun i j : ι => (s i ∩ s j).Nonempty ∧ i ∈ t) i j) :
IsConnected (⋃ n ∈ t, s n) :=
⟨nonempty_biUnion.2 <| ⟨ht.some, ht.some_mem, (H _ ht.some_mem).nonempty⟩,
IsPreconnected.biUnion_of_reflTransGen (fun i hi => (H i hi).isPreconnected) K⟩
#align is_connected.bUnion_of_refl_trans_gen IsConnected.biUnion_of_reflTransGen
theorem IsPreconnected.iUnion_of_reflTransGen {ι : Type*} {s : ι → Set α}
(H : ∀ i, IsPreconnected (s i))
(K : ∀ i j, ReflTransGen (fun i j : ι => (s i ∩ s j).Nonempty) i j) :
IsPreconnected (⋃ n, s n) := by
rw [← biUnion_univ]
exact IsPreconnected.biUnion_of_reflTransGen (fun i _ => H i) fun i _ j _ => by
simpa [mem_univ] using K i j
#align is_preconnected.Union_of_refl_trans_gen IsPreconnected.iUnion_of_reflTransGen
theorem IsConnected.iUnion_of_reflTransGen {ι : Type*} [Nonempty ι] {s : ι → Set α}
(H : ∀ i, IsConnected (s i))
(K : ∀ i j, ReflTransGen (fun i j : ι => (s i ∩ s j).Nonempty) i j) : IsConnected (⋃ n, s n) :=
⟨nonempty_iUnion.2 <| Nonempty.elim ‹_› fun i : ι => ⟨i, (H _).nonempty⟩,
IsPreconnected.iUnion_of_reflTransGen (fun i => (H i).isPreconnected) K⟩
#align is_connected.Union_of_refl_trans_gen IsConnected.iUnion_of_reflTransGen
protected theorem IsPreconnected.subset_closure {s : Set α} {t : Set α} (H : IsPreconnected s)
(Kst : s ⊆ t) (Ktcs : t ⊆ closure s) : IsPreconnected t :=
fun u v hu hv htuv ⟨_y, hyt, hyu⟩ ⟨_z, hzt, hzv⟩ =>
let ⟨p, hpu, hps⟩ := mem_closure_iff.1 (Ktcs hyt) u hu hyu
let ⟨q, hqv, hqs⟩ := mem_closure_iff.1 (Ktcs hzt) v hv hzv
let ⟨r, hrs, hruv⟩ := H u v hu hv (Subset.trans Kst htuv) ⟨p, hps, hpu⟩ ⟨q, hqs, hqv⟩
⟨r, Kst hrs, hruv⟩
#align is_preconnected.subset_closure IsPreconnected.subset_closure
protected theorem IsConnected.subset_closure {s : Set α} {t : Set α} (H : IsConnected s)
(Kst : s ⊆ t) (Ktcs : t ⊆ closure s) : IsConnected t :=
⟨Nonempty.mono Kst H.left, IsPreconnected.subset_closure H.right Kst Ktcs⟩
#align is_connected.subset_closure IsConnected.subset_closure
protected theorem IsPreconnected.closure {s : Set α} (H : IsPreconnected s) :
IsPreconnected (closure s) :=
IsPreconnected.subset_closure H subset_closure Subset.rfl
#align is_preconnected.closure IsPreconnected.closure
protected theorem IsConnected.closure {s : Set α} (H : IsConnected s) : IsConnected (closure s) :=
IsConnected.subset_closure H subset_closure <| Subset.rfl
#align is_connected.closure IsConnected.closure
protected theorem IsPreconnected.image [TopologicalSpace β] {s : Set α} (H : IsPreconnected s)
(f : α → β) (hf : ContinuousOn f s) : IsPreconnected (f '' s) := by
-- Unfold/destruct definitions in hypotheses
rintro u v hu hv huv ⟨_, ⟨x, xs, rfl⟩, xu⟩ ⟨_, ⟨y, ys, rfl⟩, yv⟩
rcases continuousOn_iff'.1 hf u hu with ⟨u', hu', u'_eq⟩
rcases continuousOn_iff'.1 hf v hv with ⟨v', hv', v'_eq⟩
-- Reformulate `huv : f '' s ⊆ u ∪ v` in terms of `u'` and `v'`
replace huv : s ⊆ u' ∪ v' := by
rw [image_subset_iff, preimage_union] at huv
replace huv := subset_inter huv Subset.rfl
rw [union_inter_distrib_right, u'_eq, v'_eq, ← union_inter_distrib_right] at huv
exact (subset_inter_iff.1 huv).1
-- Now `s ⊆ u' ∪ v'`, so we can apply `‹IsPreconnected s›`
obtain ⟨z, hz⟩ : (s ∩ (u' ∩ v')).Nonempty := by
refine H u' v' hu' hv' huv ⟨x, ?_⟩ ⟨y, ?_⟩ <;> rw [inter_comm]
exacts [u'_eq ▸ ⟨xu, xs⟩, v'_eq ▸ ⟨yv, ys⟩]
rw [← inter_self s, inter_assoc, inter_left_comm s u', ← inter_assoc, inter_comm s, inter_comm s,
← u'_eq, ← v'_eq] at hz
exact ⟨f z, ⟨z, hz.1.2, rfl⟩, hz.1.1, hz.2.1⟩
#align is_preconnected.image IsPreconnected.image
protected theorem IsConnected.image [TopologicalSpace β] {s : Set α} (H : IsConnected s) (f : α → β)
(hf : ContinuousOn f s) : IsConnected (f '' s) :=
⟨image_nonempty.mpr H.nonempty, H.isPreconnected.image f hf⟩
#align is_connected.image IsConnected.image
theorem isPreconnected_closed_iff {s : Set α} :
IsPreconnected s ↔ ∀ t t', IsClosed t → IsClosed t' →
s ⊆ t ∪ t' → (s ∩ t).Nonempty → (s ∩ t').Nonempty → (s ∩ (t ∩ t')).Nonempty :=
⟨by
rintro h t t' ht ht' htt' ⟨x, xs, xt⟩ ⟨y, ys, yt'⟩
rw [← not_disjoint_iff_nonempty_inter, ← subset_compl_iff_disjoint_right, compl_inter]
intro h'
have xt' : x ∉ t' := (h' xs).resolve_left (absurd xt)
have yt : y ∉ t := (h' ys).resolve_right (absurd yt')
have := h _ _ ht.isOpen_compl ht'.isOpen_compl h' ⟨y, ys, yt⟩ ⟨x, xs, xt'⟩
rw [← compl_union] at this
exact this.ne_empty htt'.disjoint_compl_right.inter_eq,
by
rintro h u v hu hv huv ⟨x, xs, xu⟩ ⟨y, ys, yv⟩
rw [← not_disjoint_iff_nonempty_inter, ← subset_compl_iff_disjoint_right, compl_inter]
intro h'
have xv : x ∉ v := (h' xs).elim (absurd xu) id
have yu : y ∉ u := (h' ys).elim id (absurd yv)
have := h _ _ hu.isClosed_compl hv.isClosed_compl h' ⟨y, ys, yu⟩ ⟨x, xs, xv⟩
rw [← compl_union] at this
exact this.ne_empty huv.disjoint_compl_right.inter_eq⟩
#align is_preconnected_closed_iff isPreconnected_closed_iff
theorem Inducing.isPreconnected_image [TopologicalSpace β] {s : Set α} {f : α → β}
(hf : Inducing f) : IsPreconnected (f '' s) ↔ IsPreconnected s := by
refine ⟨fun h => ?_, fun h => h.image _ hf.continuous.continuousOn⟩
rintro u v hu' hv' huv ⟨x, hxs, hxu⟩ ⟨y, hys, hyv⟩
rcases hf.isOpen_iff.1 hu' with ⟨u, hu, rfl⟩
rcases hf.isOpen_iff.1 hv' with ⟨v, hv, rfl⟩
replace huv : f '' s ⊆ u ∪ v := by rwa [image_subset_iff]
rcases h u v hu hv huv ⟨f x, mem_image_of_mem _ hxs, hxu⟩ ⟨f y, mem_image_of_mem _ hys, hyv⟩ with
⟨_, ⟨z, hzs, rfl⟩, hzuv⟩
exact ⟨z, hzs, hzuv⟩
#align inducing.is_preconnected_image Inducing.isPreconnected_image
theorem IsPreconnected.preimage_of_isOpenMap [TopologicalSpace β] {f : α → β} {s : Set β}
(hs : IsPreconnected s) (hinj : Function.Injective f) (hf : IsOpenMap f) (hsf : s ⊆ range f) :
IsPreconnected (f ⁻¹' s) := fun u v hu hv hsuv hsu hsv => by
replace hsf : f '' (f ⁻¹' s) = s := image_preimage_eq_of_subset hsf
obtain ⟨_, has, ⟨a, hau, rfl⟩, hav⟩ : (s ∩ (f '' u ∩ f '' v)).Nonempty := by
refine hs (f '' u) (f '' v) (hf u hu) (hf v hv) ?_ ?_ ?_
· simpa only [hsf, image_union] using image_subset f hsuv
· simpa only [image_preimage_inter] using hsu.image f
· simpa only [image_preimage_inter] using hsv.image f
· exact ⟨a, has, hau, hinj.mem_set_image.1 hav⟩
#align is_preconnected.preimage_of_open_map IsPreconnected.preimage_of_isOpenMap
theorem IsPreconnected.preimage_of_isClosedMap [TopologicalSpace β] {s : Set β}
(hs : IsPreconnected s) {f : α → β} (hinj : Function.Injective f) (hf : IsClosedMap f)
(hsf : s ⊆ range f) : IsPreconnected (f ⁻¹' s) :=
isPreconnected_closed_iff.2 fun u v hu hv hsuv hsu hsv => by
replace hsf : f '' (f ⁻¹' s) = s := image_preimage_eq_of_subset hsf
obtain ⟨_, has, ⟨a, hau, rfl⟩, hav⟩ : (s ∩ (f '' u ∩ f '' v)).Nonempty := by
refine isPreconnected_closed_iff.1 hs (f '' u) (f '' v) (hf u hu) (hf v hv) ?_ ?_ ?_
· simpa only [hsf, image_union] using image_subset f hsuv
· simpa only [image_preimage_inter] using hsu.image f
· simpa only [image_preimage_inter] using hsv.image f
· exact ⟨a, has, hau, hinj.mem_set_image.1 hav⟩
#align is_preconnected.preimage_of_closed_map IsPreconnected.preimage_of_isClosedMap
theorem IsConnected.preimage_of_isOpenMap [TopologicalSpace β] {s : Set β} (hs : IsConnected s)
{f : α → β} (hinj : Function.Injective f) (hf : IsOpenMap f) (hsf : s ⊆ range f) :
IsConnected (f ⁻¹' s) :=
⟨hs.nonempty.preimage' hsf, hs.isPreconnected.preimage_of_isOpenMap hinj hf hsf⟩
#align is_connected.preimage_of_open_map IsConnected.preimage_of_isOpenMap
theorem IsConnected.preimage_of_isClosedMap [TopologicalSpace β] {s : Set β} (hs : IsConnected s)
{f : α → β} (hinj : Function.Injective f) (hf : IsClosedMap f) (hsf : s ⊆ range f) :
IsConnected (f ⁻¹' s) :=
⟨hs.nonempty.preimage' hsf, hs.isPreconnected.preimage_of_isClosedMap hinj hf hsf⟩
#align is_connected.preimage_of_closed_map IsConnected.preimage_of_isClosedMap
| Mathlib/Topology/Connected/Basic.lean | 413 | 421 | theorem IsPreconnected.subset_or_subset (hu : IsOpen u) (hv : IsOpen v) (huv : Disjoint u v)
(hsuv : s ⊆ u ∪ v) (hs : IsPreconnected s) : s ⊆ u ∨ s ⊆ v := by |
specialize hs u v hu hv hsuv
obtain hsu | hsu := (s ∩ u).eq_empty_or_nonempty
· exact Or.inr ((Set.disjoint_iff_inter_eq_empty.2 hsu).subset_right_of_subset_union hsuv)
· replace hs := mt (hs hsu)
simp_rw [Set.not_nonempty_iff_eq_empty, ← Set.disjoint_iff_inter_eq_empty,
disjoint_iff_inter_eq_empty.1 huv] at hs
exact Or.inl ((hs s.disjoint_empty).subset_left_of_subset_union hsuv)
|
import Mathlib.SetTheory.Ordinal.Basic
import Mathlib.Data.Nat.SuccPred
#align_import set_theory.ordinal.arithmetic from "leanprover-community/mathlib"@"31b269b60935483943542d547a6dd83a66b37dc7"
assert_not_exists Field
assert_not_exists Module
noncomputable section
open Function Cardinal Set Equiv Order
open scoped Classical
open Cardinal Ordinal
universe u v w
namespace Ordinal
variable {α : Type*} {β : Type*} {γ : Type*} {r : α → α → Prop} {s : β → β → Prop}
{t : γ → γ → Prop}
@[simp]
theorem lift_add (a b : Ordinal.{v}) : lift.{u} (a + b) = lift.{u} a + lift.{u} b :=
Quotient.inductionOn₂ a b fun ⟨_α, _r, _⟩ ⟨_β, _s, _⟩ =>
Quotient.sound
⟨(RelIso.preimage Equiv.ulift _).trans
(RelIso.sumLexCongr (RelIso.preimage Equiv.ulift _) (RelIso.preimage Equiv.ulift _)).symm⟩
#align ordinal.lift_add Ordinal.lift_add
@[simp]
theorem lift_succ (a : Ordinal.{v}) : lift.{u} (succ a) = succ (lift.{u} a) := by
rw [← add_one_eq_succ, lift_add, lift_one]
rfl
#align ordinal.lift_succ Ordinal.lift_succ
instance add_contravariantClass_le : ContravariantClass Ordinal.{u} Ordinal.{u} (· + ·) (· ≤ ·) :=
⟨fun a b c =>
inductionOn a fun α r hr =>
inductionOn b fun β₁ s₁ hs₁ =>
inductionOn c fun β₂ s₂ hs₂ ⟨f⟩ =>
⟨have fl : ∀ a, f (Sum.inl a) = Sum.inl a := fun a => by
simpa only [InitialSeg.trans_apply, InitialSeg.leAdd_apply] using
@InitialSeg.eq _ _ _ _ _
((InitialSeg.leAdd r s₁).trans f) (InitialSeg.leAdd r s₂) a
have : ∀ b, { b' // f (Sum.inr b) = Sum.inr b' } := by
intro b; cases e : f (Sum.inr b)
· rw [← fl] at e
have := f.inj' e
contradiction
· exact ⟨_, rfl⟩
let g (b) := (this b).1
have fr : ∀ b, f (Sum.inr b) = Sum.inr (g b) := fun b => (this b).2
⟨⟨⟨g, fun x y h => by
injection f.inj' (by rw [fr, fr, h] : f (Sum.inr x) = f (Sum.inr y))⟩,
@fun a b => by
-- Porting note:
-- `relEmbedding.coe_fn_to_embedding` & `initial_seg.coe_fn_to_rel_embedding`
-- → `InitialSeg.coe_coe_fn`
simpa only [Sum.lex_inr_inr, fr, InitialSeg.coe_coe_fn, Embedding.coeFn_mk] using
@RelEmbedding.map_rel_iff _ _ _ _ f.toRelEmbedding (Sum.inr a) (Sum.inr b)⟩,
fun a b H => by
rcases f.init (by rw [fr] <;> exact Sum.lex_inr_inr.2 H) with ⟨a' | a', h⟩
· rw [fl] at h
cases h
· rw [fr] at h
exact ⟨a', Sum.inr.inj h⟩⟩⟩⟩
#align ordinal.add_contravariant_class_le Ordinal.add_contravariantClass_le
theorem add_left_cancel (a) {b c : Ordinal} : a + b = a + c ↔ b = c := by
simp only [le_antisymm_iff, add_le_add_iff_left]
#align ordinal.add_left_cancel Ordinal.add_left_cancel
private theorem add_lt_add_iff_left' (a) {b c : Ordinal} : a + b < a + c ↔ b < c := by
rw [← not_le, ← not_le, add_le_add_iff_left]
instance add_covariantClass_lt : CovariantClass Ordinal.{u} Ordinal.{u} (· + ·) (· < ·) :=
⟨fun a _b _c => (add_lt_add_iff_left' a).2⟩
#align ordinal.add_covariant_class_lt Ordinal.add_covariantClass_lt
instance add_contravariantClass_lt : ContravariantClass Ordinal.{u} Ordinal.{u} (· + ·) (· < ·) :=
⟨fun a _b _c => (add_lt_add_iff_left' a).1⟩
#align ordinal.add_contravariant_class_lt Ordinal.add_contravariantClass_lt
instance add_swap_contravariantClass_lt :
ContravariantClass Ordinal.{u} Ordinal.{u} (swap (· + ·)) (· < ·) :=
⟨fun _a _b _c => lt_imp_lt_of_le_imp_le fun h => add_le_add_right h _⟩
#align ordinal.add_swap_contravariant_class_lt Ordinal.add_swap_contravariantClass_lt
theorem add_le_add_iff_right {a b : Ordinal} : ∀ n : ℕ, a + n ≤ b + n ↔ a ≤ b
| 0 => by simp
| n + 1 => by
simp only [natCast_succ, add_succ, add_succ, succ_le_succ_iff, add_le_add_iff_right]
#align ordinal.add_le_add_iff_right Ordinal.add_le_add_iff_right
theorem add_right_cancel {a b : Ordinal} (n : ℕ) : a + n = b + n ↔ a = b := by
simp only [le_antisymm_iff, add_le_add_iff_right]
#align ordinal.add_right_cancel Ordinal.add_right_cancel
theorem add_eq_zero_iff {a b : Ordinal} : a + b = 0 ↔ a = 0 ∧ b = 0 :=
inductionOn a fun α r _ =>
inductionOn b fun β s _ => by
simp_rw [← type_sum_lex, type_eq_zero_iff_isEmpty]
exact isEmpty_sum
#align ordinal.add_eq_zero_iff Ordinal.add_eq_zero_iff
theorem left_eq_zero_of_add_eq_zero {a b : Ordinal} (h : a + b = 0) : a = 0 :=
(add_eq_zero_iff.1 h).1
#align ordinal.left_eq_zero_of_add_eq_zero Ordinal.left_eq_zero_of_add_eq_zero
theorem right_eq_zero_of_add_eq_zero {a b : Ordinal} (h : a + b = 0) : b = 0 :=
(add_eq_zero_iff.1 h).2
#align ordinal.right_eq_zero_of_add_eq_zero Ordinal.right_eq_zero_of_add_eq_zero
def pred (o : Ordinal) : Ordinal :=
if h : ∃ a, o = succ a then Classical.choose h else o
#align ordinal.pred Ordinal.pred
@[simp]
theorem pred_succ (o) : pred (succ o) = o := by
have h : ∃ a, succ o = succ a := ⟨_, rfl⟩;
simpa only [pred, dif_pos h] using (succ_injective <| Classical.choose_spec h).symm
#align ordinal.pred_succ Ordinal.pred_succ
theorem pred_le_self (o) : pred o ≤ o :=
if h : ∃ a, o = succ a then by
let ⟨a, e⟩ := h
rw [e, pred_succ]; exact le_succ a
else by rw [pred, dif_neg h]
#align ordinal.pred_le_self Ordinal.pred_le_self
theorem pred_eq_iff_not_succ {o} : pred o = o ↔ ¬∃ a, o = succ a :=
⟨fun e ⟨a, e'⟩ => by rw [e', pred_succ] at e; exact (lt_succ a).ne e, fun h => dif_neg h⟩
#align ordinal.pred_eq_iff_not_succ Ordinal.pred_eq_iff_not_succ
theorem pred_eq_iff_not_succ' {o} : pred o = o ↔ ∀ a, o ≠ succ a := by
simpa using pred_eq_iff_not_succ
#align ordinal.pred_eq_iff_not_succ' Ordinal.pred_eq_iff_not_succ'
theorem pred_lt_iff_is_succ {o} : pred o < o ↔ ∃ a, o = succ a :=
Iff.trans (by simp only [le_antisymm_iff, pred_le_self, true_and_iff, not_le])
(iff_not_comm.1 pred_eq_iff_not_succ).symm
#align ordinal.pred_lt_iff_is_succ Ordinal.pred_lt_iff_is_succ
@[simp]
theorem pred_zero : pred 0 = 0 :=
pred_eq_iff_not_succ'.2 fun a => (succ_ne_zero a).symm
#align ordinal.pred_zero Ordinal.pred_zero
theorem succ_pred_iff_is_succ {o} : succ (pred o) = o ↔ ∃ a, o = succ a :=
⟨fun e => ⟨_, e.symm⟩, fun ⟨a, e⟩ => by simp only [e, pred_succ]⟩
#align ordinal.succ_pred_iff_is_succ Ordinal.succ_pred_iff_is_succ
theorem succ_lt_of_not_succ {o b : Ordinal} (h : ¬∃ a, o = succ a) : succ b < o ↔ b < o :=
⟨(lt_succ b).trans, fun l => lt_of_le_of_ne (succ_le_of_lt l) fun e => h ⟨_, e.symm⟩⟩
#align ordinal.succ_lt_of_not_succ Ordinal.succ_lt_of_not_succ
theorem lt_pred {a b} : a < pred b ↔ succ a < b :=
if h : ∃ a, b = succ a then by
let ⟨c, e⟩ := h
rw [e, pred_succ, succ_lt_succ_iff]
else by simp only [pred, dif_neg h, succ_lt_of_not_succ h]
#align ordinal.lt_pred Ordinal.lt_pred
theorem pred_le {a b} : pred a ≤ b ↔ a ≤ succ b :=
le_iff_le_iff_lt_iff_lt.2 lt_pred
#align ordinal.pred_le Ordinal.pred_le
@[simp]
theorem lift_is_succ {o : Ordinal.{v}} : (∃ a, lift.{u} o = succ a) ↔ ∃ a, o = succ a :=
⟨fun ⟨a, h⟩ =>
let ⟨b, e⟩ := lift_down <| show a ≤ lift.{u} o from le_of_lt <| h.symm ▸ lt_succ a
⟨b, lift_inj.1 <| by rw [h, ← e, lift_succ]⟩,
fun ⟨a, h⟩ => ⟨lift.{u} a, by simp only [h, lift_succ]⟩⟩
#align ordinal.lift_is_succ Ordinal.lift_is_succ
@[simp]
theorem lift_pred (o : Ordinal.{v}) : lift.{u} (pred o) = pred (lift.{u} o) :=
if h : ∃ a, o = succ a then by cases' h with a e; simp only [e, pred_succ, lift_succ]
else by rw [pred_eq_iff_not_succ.2 h, pred_eq_iff_not_succ.2 (mt lift_is_succ.1 h)]
#align ordinal.lift_pred Ordinal.lift_pred
def IsLimit (o : Ordinal) : Prop :=
o ≠ 0 ∧ ∀ a < o, succ a < o
#align ordinal.is_limit Ordinal.IsLimit
theorem IsLimit.isSuccLimit {o} (h : IsLimit o) : IsSuccLimit o := isSuccLimit_iff_succ_lt.mpr h.2
theorem IsLimit.succ_lt {o a : Ordinal} (h : IsLimit o) : a < o → succ a < o :=
h.2 a
#align ordinal.is_limit.succ_lt Ordinal.IsLimit.succ_lt
theorem isSuccLimit_zero : IsSuccLimit (0 : Ordinal) := isSuccLimit_bot
theorem not_zero_isLimit : ¬IsLimit 0
| ⟨h, _⟩ => h rfl
#align ordinal.not_zero_is_limit Ordinal.not_zero_isLimit
theorem not_succ_isLimit (o) : ¬IsLimit (succ o)
| ⟨_, h⟩ => lt_irrefl _ (h _ (lt_succ o))
#align ordinal.not_succ_is_limit Ordinal.not_succ_isLimit
theorem not_succ_of_isLimit {o} (h : IsLimit o) : ¬∃ a, o = succ a
| ⟨a, e⟩ => not_succ_isLimit a (e ▸ h)
#align ordinal.not_succ_of_is_limit Ordinal.not_succ_of_isLimit
theorem succ_lt_of_isLimit {o a : Ordinal} (h : IsLimit o) : succ a < o ↔ a < o :=
⟨(lt_succ a).trans, h.2 _⟩
#align ordinal.succ_lt_of_is_limit Ordinal.succ_lt_of_isLimit
theorem le_succ_of_isLimit {o} (h : IsLimit o) {a} : o ≤ succ a ↔ o ≤ a :=
le_iff_le_iff_lt_iff_lt.2 <| succ_lt_of_isLimit h
#align ordinal.le_succ_of_is_limit Ordinal.le_succ_of_isLimit
theorem limit_le {o} (h : IsLimit o) {a} : o ≤ a ↔ ∀ x < o, x ≤ a :=
⟨fun h _x l => l.le.trans h, fun H =>
(le_succ_of_isLimit h).1 <| le_of_not_lt fun hn => not_lt_of_le (H _ hn) (lt_succ a)⟩
#align ordinal.limit_le Ordinal.limit_le
theorem lt_limit {o} (h : IsLimit o) {a} : a < o ↔ ∃ x < o, a < x := by
-- Porting note: `bex_def` is required.
simpa only [not_forall₂, not_le, bex_def] using not_congr (@limit_le _ h a)
#align ordinal.lt_limit Ordinal.lt_limit
@[simp]
theorem lift_isLimit (o) : IsLimit (lift o) ↔ IsLimit o :=
and_congr (not_congr <| by simpa only [lift_zero] using @lift_inj o 0)
⟨fun H a h => lift_lt.1 <| by simpa only [lift_succ] using H _ (lift_lt.2 h), fun H a h => by
obtain ⟨a', rfl⟩ := lift_down h.le
rw [← lift_succ, lift_lt]
exact H a' (lift_lt.1 h)⟩
#align ordinal.lift_is_limit Ordinal.lift_isLimit
theorem IsLimit.pos {o : Ordinal} (h : IsLimit o) : 0 < o :=
lt_of_le_of_ne (Ordinal.zero_le _) h.1.symm
#align ordinal.is_limit.pos Ordinal.IsLimit.pos
theorem IsLimit.one_lt {o : Ordinal} (h : IsLimit o) : 1 < o := by
simpa only [succ_zero] using h.2 _ h.pos
#align ordinal.is_limit.one_lt Ordinal.IsLimit.one_lt
theorem IsLimit.nat_lt {o : Ordinal} (h : IsLimit o) : ∀ n : ℕ, (n : Ordinal) < o
| 0 => h.pos
| n + 1 => h.2 _ (IsLimit.nat_lt h n)
#align ordinal.is_limit.nat_lt Ordinal.IsLimit.nat_lt
theorem zero_or_succ_or_limit (o : Ordinal) : o = 0 ∨ (∃ a, o = succ a) ∨ IsLimit o :=
if o0 : o = 0 then Or.inl o0
else
if h : ∃ a, o = succ a then Or.inr (Or.inl h)
else Or.inr <| Or.inr ⟨o0, fun _a => (succ_lt_of_not_succ h).2⟩
#align ordinal.zero_or_succ_or_limit Ordinal.zero_or_succ_or_limit
@[elab_as_elim]
def limitRecOn {C : Ordinal → Sort*} (o : Ordinal) (H₁ : C 0) (H₂ : ∀ o, C o → C (succ o))
(H₃ : ∀ o, IsLimit o → (∀ o' < o, C o') → C o) : C o :=
SuccOrder.limitRecOn o (fun o _ ↦ H₂ o) fun o hl ↦
if h : o = 0 then fun _ ↦ h ▸ H₁ else H₃ o ⟨h, fun _ ↦ hl.succ_lt⟩
#align ordinal.limit_rec_on Ordinal.limitRecOn
@[simp]
theorem limitRecOn_zero {C} (H₁ H₂ H₃) : @limitRecOn C 0 H₁ H₂ H₃ = H₁ := by
rw [limitRecOn, SuccOrder.limitRecOn_limit _ _ isSuccLimit_zero, dif_pos rfl]
#align ordinal.limit_rec_on_zero Ordinal.limitRecOn_zero
@[simp]
theorem limitRecOn_succ {C} (o H₁ H₂ H₃) :
@limitRecOn C (succ o) H₁ H₂ H₃ = H₂ o (@limitRecOn C o H₁ H₂ H₃) := by
simp_rw [limitRecOn, SuccOrder.limitRecOn_succ _ _ (not_isMax _)]
#align ordinal.limit_rec_on_succ Ordinal.limitRecOn_succ
@[simp]
theorem limitRecOn_limit {C} (o H₁ H₂ H₃ h) :
@limitRecOn C o H₁ H₂ H₃ = H₃ o h fun x _h => @limitRecOn C x H₁ H₂ H₃ := by
simp_rw [limitRecOn, SuccOrder.limitRecOn_limit _ _ h.isSuccLimit, dif_neg h.1]
#align ordinal.limit_rec_on_limit Ordinal.limitRecOn_limit
instance orderTopOutSucc (o : Ordinal) : OrderTop (succ o).out.α :=
@OrderTop.mk _ _ (Top.mk _) le_enum_succ
#align ordinal.order_top_out_succ Ordinal.orderTopOutSucc
theorem enum_succ_eq_top {o : Ordinal} :
enum (· < ·) o
(by
rw [type_lt]
exact lt_succ o) =
(⊤ : (succ o).out.α) :=
rfl
#align ordinal.enum_succ_eq_top Ordinal.enum_succ_eq_top
theorem has_succ_of_type_succ_lt {α} {r : α → α → Prop} [wo : IsWellOrder α r]
(h : ∀ a < type r, succ a < type r) (x : α) : ∃ y, r x y := by
use enum r (succ (typein r x)) (h _ (typein_lt_type r x))
convert (enum_lt_enum (typein_lt_type r x)
(h _ (typein_lt_type r x))).mpr (lt_succ _); rw [enum_typein]
#align ordinal.has_succ_of_type_succ_lt Ordinal.has_succ_of_type_succ_lt
theorem out_no_max_of_succ_lt {o : Ordinal} (ho : ∀ a < o, succ a < o) : NoMaxOrder o.out.α :=
⟨has_succ_of_type_succ_lt (by rwa [type_lt])⟩
#align ordinal.out_no_max_of_succ_lt Ordinal.out_no_max_of_succ_lt
theorem bounded_singleton {r : α → α → Prop} [IsWellOrder α r] (hr : (type r).IsLimit) (x) :
Bounded r {x} := by
refine ⟨enum r (succ (typein r x)) (hr.2 _ (typein_lt_type r x)), ?_⟩
intro b hb
rw [mem_singleton_iff.1 hb]
nth_rw 1 [← enum_typein r x]
rw [@enum_lt_enum _ r]
apply lt_succ
#align ordinal.bounded_singleton Ordinal.bounded_singleton
-- Porting note: `· < ·` requires a type ascription for an `IsWellOrder` instance.
theorem type_subrel_lt (o : Ordinal.{u}) :
type (Subrel ((· < ·) : Ordinal → Ordinal → Prop) { o' : Ordinal | o' < o })
= Ordinal.lift.{u + 1} o := by
refine Quotient.inductionOn o ?_
rintro ⟨α, r, wo⟩; apply Quotient.sound
-- Porting note: `symm; refine' [term]` → `refine' [term].symm`
constructor; refine ((RelIso.preimage Equiv.ulift r).trans (enumIso r).symm).symm
#align ordinal.type_subrel_lt Ordinal.type_subrel_lt
theorem mk_initialSeg (o : Ordinal.{u}) :
#{ o' : Ordinal | o' < o } = Cardinal.lift.{u + 1} o.card := by
rw [lift_card, ← type_subrel_lt, card_type]
#align ordinal.mk_initial_seg Ordinal.mk_initialSeg
def IsNormal (f : Ordinal → Ordinal) : Prop :=
(∀ o, f o < f (succ o)) ∧ ∀ o, IsLimit o → ∀ a, f o ≤ a ↔ ∀ b < o, f b ≤ a
#align ordinal.is_normal Ordinal.IsNormal
theorem IsNormal.limit_le {f} (H : IsNormal f) :
∀ {o}, IsLimit o → ∀ {a}, f o ≤ a ↔ ∀ b < o, f b ≤ a :=
@H.2
#align ordinal.is_normal.limit_le Ordinal.IsNormal.limit_le
theorem IsNormal.limit_lt {f} (H : IsNormal f) {o} (h : IsLimit o) {a} :
a < f o ↔ ∃ b < o, a < f b :=
not_iff_not.1 <| by simpa only [exists_prop, not_exists, not_and, not_lt] using H.2 _ h a
#align ordinal.is_normal.limit_lt Ordinal.IsNormal.limit_lt
theorem IsNormal.strictMono {f} (H : IsNormal f) : StrictMono f := fun a b =>
limitRecOn b (Not.elim (not_lt_of_le <| Ordinal.zero_le _))
(fun _b IH h =>
(lt_or_eq_of_le (le_of_lt_succ h)).elim (fun h => (IH h).trans (H.1 _)) fun e => e ▸ H.1 _)
fun _b l _IH h => lt_of_lt_of_le (H.1 a) ((H.2 _ l _).1 le_rfl _ (l.2 _ h))
#align ordinal.is_normal.strict_mono Ordinal.IsNormal.strictMono
theorem IsNormal.monotone {f} (H : IsNormal f) : Monotone f :=
H.strictMono.monotone
#align ordinal.is_normal.monotone Ordinal.IsNormal.monotone
theorem isNormal_iff_strictMono_limit (f : Ordinal → Ordinal) :
IsNormal f ↔ StrictMono f ∧ ∀ o, IsLimit o → ∀ a, (∀ b < o, f b ≤ a) → f o ≤ a :=
⟨fun hf => ⟨hf.strictMono, fun a ha c => (hf.2 a ha c).2⟩, fun ⟨hs, hl⟩ =>
⟨fun a => hs (lt_succ a), fun a ha c =>
⟨fun hac _b hba => ((hs hba).trans_le hac).le, hl a ha c⟩⟩⟩
#align ordinal.is_normal_iff_strict_mono_limit Ordinal.isNormal_iff_strictMono_limit
theorem IsNormal.lt_iff {f} (H : IsNormal f) {a b} : f a < f b ↔ a < b :=
StrictMono.lt_iff_lt <| H.strictMono
#align ordinal.is_normal.lt_iff Ordinal.IsNormal.lt_iff
theorem IsNormal.le_iff {f} (H : IsNormal f) {a b} : f a ≤ f b ↔ a ≤ b :=
le_iff_le_iff_lt_iff_lt.2 H.lt_iff
#align ordinal.is_normal.le_iff Ordinal.IsNormal.le_iff
theorem IsNormal.inj {f} (H : IsNormal f) {a b} : f a = f b ↔ a = b := by
simp only [le_antisymm_iff, H.le_iff]
#align ordinal.is_normal.inj Ordinal.IsNormal.inj
theorem IsNormal.self_le {f} (H : IsNormal f) (a) : a ≤ f a :=
lt_wf.self_le_of_strictMono H.strictMono a
#align ordinal.is_normal.self_le Ordinal.IsNormal.self_le
theorem IsNormal.le_set {f o} (H : IsNormal f) (p : Set Ordinal) (p0 : p.Nonempty) (b)
(H₂ : ∀ o, b ≤ o ↔ ∀ a ∈ p, a ≤ o) : f b ≤ o ↔ ∀ a ∈ p, f a ≤ o :=
⟨fun h a pa => (H.le_iff.2 ((H₂ _).1 le_rfl _ pa)).trans h, fun h => by
-- Porting note: `refine'` didn't work well so `induction` is used
induction b using limitRecOn with
| H₁ =>
cases' p0 with x px
have := Ordinal.le_zero.1 ((H₂ _).1 (Ordinal.zero_le _) _ px)
rw [this] at px
exact h _ px
| H₂ S _ =>
rcases not_forall₂.1 (mt (H₂ S).2 <| (lt_succ S).not_le) with ⟨a, h₁, h₂⟩
exact (H.le_iff.2 <| succ_le_of_lt <| not_le.1 h₂).trans (h _ h₁)
| H₃ S L _ =>
refine (H.2 _ L _).2 fun a h' => ?_
rcases not_forall₂.1 (mt (H₂ a).2 h'.not_le) with ⟨b, h₁, h₂⟩
exact (H.le_iff.2 <| (not_le.1 h₂).le).trans (h _ h₁)⟩
#align ordinal.is_normal.le_set Ordinal.IsNormal.le_set
theorem IsNormal.le_set' {f o} (H : IsNormal f) (p : Set α) (p0 : p.Nonempty) (g : α → Ordinal) (b)
(H₂ : ∀ o, b ≤ o ↔ ∀ a ∈ p, g a ≤ o) : f b ≤ o ↔ ∀ a ∈ p, f (g a) ≤ o := by
simpa [H₂] using H.le_set (g '' p) (p0.image g) b
#align ordinal.is_normal.le_set' Ordinal.IsNormal.le_set'
theorem IsNormal.refl : IsNormal id :=
⟨lt_succ, fun _o l _a => Ordinal.limit_le l⟩
#align ordinal.is_normal.refl Ordinal.IsNormal.refl
theorem IsNormal.trans {f g} (H₁ : IsNormal f) (H₂ : IsNormal g) : IsNormal (f ∘ g) :=
⟨fun _x => H₁.lt_iff.2 (H₂.1 _), fun o l _a =>
H₁.le_set' (· < o) ⟨0, l.pos⟩ g _ fun _c => H₂.2 _ l _⟩
#align ordinal.is_normal.trans Ordinal.IsNormal.trans
theorem IsNormal.isLimit {f} (H : IsNormal f) {o} (l : IsLimit o) : IsLimit (f o) :=
⟨ne_of_gt <| (Ordinal.zero_le _).trans_lt <| H.lt_iff.2 l.pos, fun _ h =>
let ⟨_b, h₁, h₂⟩ := (H.limit_lt l).1 h
(succ_le_of_lt h₂).trans_lt (H.lt_iff.2 h₁)⟩
#align ordinal.is_normal.is_limit Ordinal.IsNormal.isLimit
theorem IsNormal.le_iff_eq {f} (H : IsNormal f) {a} : f a ≤ a ↔ f a = a :=
(H.self_le a).le_iff_eq
#align ordinal.is_normal.le_iff_eq Ordinal.IsNormal.le_iff_eq
theorem add_le_of_limit {a b c : Ordinal} (h : IsLimit b) : a + b ≤ c ↔ ∀ b' < b, a + b' ≤ c :=
⟨fun h b' l => (add_le_add_left l.le _).trans h, fun H =>
le_of_not_lt <| by
-- Porting note: `induction` tactics are required because of the parser bug.
induction a using inductionOn with
| H α r =>
induction b using inductionOn with
| H β s =>
intro l
suffices ∀ x : β, Sum.Lex r s (Sum.inr x) (enum _ _ l) by
-- Porting note: `revert` & `intro` is required because `cases'` doesn't replace
-- `enum _ _ l` in `this`.
revert this; cases' enum _ _ l with x x <;> intro this
· cases this (enum s 0 h.pos)
· exact irrefl _ (this _)
intro x
rw [← typein_lt_typein (Sum.Lex r s), typein_enum]
have := H _ (h.2 _ (typein_lt_type s x))
rw [add_succ, succ_le_iff] at this
refine
(RelEmbedding.ofMonotone (fun a => ?_) fun a b => ?_).ordinal_type_le.trans_lt this
· rcases a with ⟨a | b, h⟩
· exact Sum.inl a
· exact Sum.inr ⟨b, by cases h; assumption⟩
· rcases a with ⟨a | a, h₁⟩ <;> rcases b with ⟨b | b, h₂⟩ <;> cases h₁ <;> cases h₂ <;>
rintro ⟨⟩ <;> constructor <;> assumption⟩
#align ordinal.add_le_of_limit Ordinal.add_le_of_limit
theorem add_isNormal (a : Ordinal) : IsNormal (a + ·) :=
⟨fun b => (add_lt_add_iff_left a).2 (lt_succ b), fun _b l _c => add_le_of_limit l⟩
#align ordinal.add_is_normal Ordinal.add_isNormal
theorem add_isLimit (a) {b} : IsLimit b → IsLimit (a + b) :=
(add_isNormal a).isLimit
#align ordinal.add_is_limit Ordinal.add_isLimit
alias IsLimit.add := add_isLimit
#align ordinal.is_limit.add Ordinal.IsLimit.add
theorem sub_nonempty {a b : Ordinal} : { o | a ≤ b + o }.Nonempty :=
⟨a, le_add_left _ _⟩
#align ordinal.sub_nonempty Ordinal.sub_nonempty
instance sub : Sub Ordinal :=
⟨fun a b => sInf { o | a ≤ b + o }⟩
theorem le_add_sub (a b : Ordinal) : a ≤ b + (a - b) :=
csInf_mem sub_nonempty
#align ordinal.le_add_sub Ordinal.le_add_sub
theorem sub_le {a b c : Ordinal} : a - b ≤ c ↔ a ≤ b + c :=
⟨fun h => (le_add_sub a b).trans (add_le_add_left h _), fun h => csInf_le' h⟩
#align ordinal.sub_le Ordinal.sub_le
theorem lt_sub {a b c : Ordinal} : a < b - c ↔ c + a < b :=
lt_iff_lt_of_le_iff_le sub_le
#align ordinal.lt_sub Ordinal.lt_sub
theorem add_sub_cancel (a b : Ordinal) : a + b - a = b :=
le_antisymm (sub_le.2 <| le_rfl) ((add_le_add_iff_left a).1 <| le_add_sub _ _)
#align ordinal.add_sub_cancel Ordinal.add_sub_cancel
theorem sub_eq_of_add_eq {a b c : Ordinal} (h : a + b = c) : c - a = b :=
h ▸ add_sub_cancel _ _
#align ordinal.sub_eq_of_add_eq Ordinal.sub_eq_of_add_eq
theorem sub_le_self (a b : Ordinal) : a - b ≤ a :=
sub_le.2 <| le_add_left _ _
#align ordinal.sub_le_self Ordinal.sub_le_self
protected theorem add_sub_cancel_of_le {a b : Ordinal} (h : b ≤ a) : b + (a - b) = a :=
(le_add_sub a b).antisymm'
(by
rcases zero_or_succ_or_limit (a - b) with (e | ⟨c, e⟩ | l)
· simp only [e, add_zero, h]
· rw [e, add_succ, succ_le_iff, ← lt_sub, e]
exact lt_succ c
· exact (add_le_of_limit l).2 fun c l => (lt_sub.1 l).le)
#align ordinal.add_sub_cancel_of_le Ordinal.add_sub_cancel_of_le
theorem le_sub_of_le {a b c : Ordinal} (h : b ≤ a) : c ≤ a - b ↔ b + c ≤ a := by
rw [← add_le_add_iff_left b, Ordinal.add_sub_cancel_of_le h]
#align ordinal.le_sub_of_le Ordinal.le_sub_of_le
theorem sub_lt_of_le {a b c : Ordinal} (h : b ≤ a) : a - b < c ↔ a < b + c :=
lt_iff_lt_of_le_iff_le (le_sub_of_le h)
#align ordinal.sub_lt_of_le Ordinal.sub_lt_of_le
instance existsAddOfLE : ExistsAddOfLE Ordinal :=
⟨fun h => ⟨_, (Ordinal.add_sub_cancel_of_le h).symm⟩⟩
@[simp]
theorem sub_zero (a : Ordinal) : a - 0 = a := by simpa only [zero_add] using add_sub_cancel 0 a
#align ordinal.sub_zero Ordinal.sub_zero
@[simp]
| Mathlib/SetTheory/Ordinal/Arithmetic.lean | 585 | 585 | theorem zero_sub (a : Ordinal) : 0 - a = 0 := by | rw [← Ordinal.le_zero]; apply sub_le_self
|
import Mathlib.Algebra.Category.ModuleCat.Basic
import Mathlib.LinearAlgebra.TensorProduct.Basic
import Mathlib.CategoryTheory.Monoidal.Linear
#align_import algebra.category.Module.monoidal.basic from "leanprover-community/mathlib"@"74403a3b2551b0970855e14ef5e8fd0d6af1bfc2"
-- Porting note: Module
set_option linter.uppercaseLean3 false
suppress_compilation
universe v w x u
open CategoryTheory
namespace ModuleCat
variable {R : Type u} [CommRing R]
namespace MonoidalCategory
-- The definitions inside this namespace are essentially private.
-- After we build the `MonoidalCategory (Module R)` instance,
-- you should use that API.
open TensorProduct
attribute [local ext] TensorProduct.ext
def tensorObj (M N : ModuleCat R) : ModuleCat R :=
ModuleCat.of R (M ⊗[R] N)
#align Module.monoidal_category.tensor_obj ModuleCat.MonoidalCategory.tensorObj
def tensorHom {M N M' N' : ModuleCat R} (f : M ⟶ N) (g : M' ⟶ N') :
tensorObj M M' ⟶ tensorObj N N' :=
TensorProduct.map f g
#align Module.monoidal_category.tensor_hom ModuleCat.MonoidalCategory.tensorHom
def whiskerLeft (M : ModuleCat R) {N₁ N₂ : ModuleCat R} (f : N₁ ⟶ N₂) :
tensorObj M N₁ ⟶ tensorObj M N₂ :=
f.lTensor M
def whiskerRight {M₁ M₂ : ModuleCat R} (f : M₁ ⟶ M₂) (N : ModuleCat R) :
tensorObj M₁ N ⟶ tensorObj M₂ N :=
f.rTensor N
theorem tensor_id (M N : ModuleCat R) : tensorHom (𝟙 M) (𝟙 N) = 𝟙 (ModuleCat.of R (M ⊗ N)) := by
-- Porting note: even with high priority ext fails to find this
apply TensorProduct.ext
rfl
#align Module.monoidal_category.tensor_id ModuleCat.MonoidalCategory.tensor_id
theorem tensor_comp {X₁ Y₁ Z₁ X₂ Y₂ Z₂ : ModuleCat R} (f₁ : X₁ ⟶ Y₁) (f₂ : X₂ ⟶ Y₂) (g₁ : Y₁ ⟶ Z₁)
(g₂ : Y₂ ⟶ Z₂) : tensorHom (f₁ ≫ g₁) (f₂ ≫ g₂) = tensorHom f₁ f₂ ≫ tensorHom g₁ g₂ := by
-- Porting note: even with high priority ext fails to find this
apply TensorProduct.ext
rfl
#align Module.monoidal_category.tensor_comp ModuleCat.MonoidalCategory.tensor_comp
def associator (M : ModuleCat.{v} R) (N : ModuleCat.{w} R) (K : ModuleCat.{x} R) :
tensorObj (tensorObj M N) K ≅ tensorObj M (tensorObj N K) :=
(TensorProduct.assoc R M N K).toModuleIso
#align Module.monoidal_category.associator ModuleCat.MonoidalCategory.associator
def leftUnitor (M : ModuleCat.{u} R) : ModuleCat.of R (R ⊗[R] M) ≅ M :=
(LinearEquiv.toModuleIso (TensorProduct.lid R M) : of R (R ⊗ M) ≅ of R M).trans (ofSelfIso M)
#align Module.monoidal_category.left_unitor ModuleCat.MonoidalCategory.leftUnitor
def rightUnitor (M : ModuleCat.{u} R) : ModuleCat.of R (M ⊗[R] R) ≅ M :=
(LinearEquiv.toModuleIso (TensorProduct.rid R M) : of R (M ⊗ R) ≅ of R M).trans (ofSelfIso M)
#align Module.monoidal_category.right_unitor ModuleCat.MonoidalCategory.rightUnitor
instance : MonoidalCategoryStruct (ModuleCat.{u} R) where
tensorObj := tensorObj
whiskerLeft := whiskerLeft
whiskerRight := whiskerRight
tensorHom f g := TensorProduct.map f g
tensorUnit := ModuleCat.of R R
associator := associator
leftUnitor := leftUnitor
rightUnitor := rightUnitor
section
open TensorProduct (assoc map)
private theorem associator_naturality_aux {X₁ X₂ X₃ : Type*} [AddCommMonoid X₁] [AddCommMonoid X₂]
[AddCommMonoid X₃] [Module R X₁] [Module R X₂] [Module R X₃] {Y₁ Y₂ Y₃ : Type*}
[AddCommMonoid Y₁] [AddCommMonoid Y₂] [AddCommMonoid Y₃] [Module R Y₁] [Module R Y₂]
[Module R Y₃] (f₁ : X₁ →ₗ[R] Y₁) (f₂ : X₂ →ₗ[R] Y₂) (f₃ : X₃ →ₗ[R] Y₃) :
↑(assoc R Y₁ Y₂ Y₃) ∘ₗ map (map f₁ f₂) f₃ = map f₁ (map f₂ f₃) ∘ₗ ↑(assoc R X₁ X₂ X₃) := by
apply TensorProduct.ext_threefold
intro x y z
rfl
-- Porting note: private so hopeful never used outside this file
-- #align Module.monoidal_category.associator_naturality_aux ModuleCat.MonoidalCategory.associator_naturality_aux
variable (R)
private theorem pentagon_aux (W X Y Z : Type*) [AddCommMonoid W] [AddCommMonoid X]
[AddCommMonoid Y] [AddCommMonoid Z] [Module R W] [Module R X] [Module R Y] [Module R Z] :
(((assoc R X Y Z).toLinearMap.lTensor W).comp
(assoc R W (X ⊗[R] Y) Z).toLinearMap).comp
((assoc R W X Y).toLinearMap.rTensor Z) =
(assoc R W X (Y ⊗[R] Z)).toLinearMap.comp (assoc R (W ⊗[R] X) Y Z).toLinearMap := by
apply TensorProduct.ext_fourfold
intro w x y z
rfl
-- Porting note: private so hopeful never used outside this file
-- #align Module.monoidal_category.pentagon_aux Module.monoidal_category.pentagon_aux
end
theorem associator_naturality {X₁ X₂ X₃ Y₁ Y₂ Y₃ : ModuleCat R} (f₁ : X₁ ⟶ Y₁) (f₂ : X₂ ⟶ Y₂)
(f₃ : X₃ ⟶ Y₃) :
tensorHom (tensorHom f₁ f₂) f₃ ≫ (associator Y₁ Y₂ Y₃).hom =
(associator X₁ X₂ X₃).hom ≫ tensorHom f₁ (tensorHom f₂ f₃) := by
convert associator_naturality_aux f₁ f₂ f₃ using 1
#align Module.monoidal_category.associator_naturality ModuleCat.MonoidalCategory.associator_naturality
theorem pentagon (W X Y Z : ModuleCat R) :
whiskerRight (associator W X Y).hom Z ≫
(associator W (tensorObj X Y) Z).hom ≫ whiskerLeft W (associator X Y Z).hom =
(associator (tensorObj W X) Y Z).hom ≫ (associator W X (tensorObj Y Z)).hom := by
convert pentagon_aux R W X Y Z using 1
#align Module.monoidal_category.pentagon ModuleCat.MonoidalCategory.pentagon
| Mathlib/Algebra/Category/ModuleCat/Monoidal/Basic.lean | 165 | 176 | theorem leftUnitor_naturality {M N : ModuleCat R} (f : M ⟶ N) :
tensorHom (𝟙 (ModuleCat.of R R)) f ≫ (leftUnitor N).hom = (leftUnitor M).hom ≫ f := by |
-- Porting note (#11041): broken ext
apply TensorProduct.ext
apply LinearMap.ext_ring
apply LinearMap.ext; intro x
-- Porting note (#10934): used to be dsimp
change ((leftUnitor N).hom) ((tensorHom (𝟙 (of R R)) f) ((1 : R) ⊗ₜ[R] x)) =
f (((leftUnitor M).hom) (1 ⊗ₜ[R] x))
erw [TensorProduct.lid_tmul, TensorProduct.lid_tmul]
rw [LinearMap.map_smul]
rfl
|
import Mathlib.Probability.Notation
import Mathlib.Probability.Integration
import Mathlib.MeasureTheory.Function.L2Space
#align_import probability.variance from "leanprover-community/mathlib"@"f0c8bf9245297a541f468be517f1bde6195105e9"
open MeasureTheory Filter Finset
noncomputable section
open scoped MeasureTheory ProbabilityTheory ENNReal NNReal
namespace ProbabilityTheory
-- Porting note: this lemma replaces `ENNReal.toReal_bit0`, which does not exist in Lean 4
private lemma coe_two : ENNReal.toReal 2 = (2 : ℝ) := rfl
-- Porting note: Consider if `evariance` or `eVariance` is better. Also,
-- consider `eVariationOn` in `Mathlib.Analysis.BoundedVariation`.
def evariance {Ω : Type*} {_ : MeasurableSpace Ω} (X : Ω → ℝ) (μ : Measure Ω) : ℝ≥0∞ :=
∫⁻ ω, (‖X ω - μ[X]‖₊ : ℝ≥0∞) ^ 2 ∂μ
#align probability_theory.evariance ProbabilityTheory.evariance
def variance {Ω : Type*} {_ : MeasurableSpace Ω} (X : Ω → ℝ) (μ : Measure Ω) : ℝ :=
(evariance X μ).toReal
#align probability_theory.variance ProbabilityTheory.variance
variable {Ω : Type*} {m : MeasurableSpace Ω} {X : Ω → ℝ} {μ : Measure Ω}
theorem _root_.MeasureTheory.Memℒp.evariance_lt_top [IsFiniteMeasure μ] (hX : Memℒp X 2 μ) :
evariance X μ < ∞ := by
have := ENNReal.pow_lt_top (hX.sub <| memℒp_const <| μ[X]).2 2
rw [snorm_eq_lintegral_rpow_nnnorm two_ne_zero ENNReal.two_ne_top, ← ENNReal.rpow_two] at this
simp only [coe_two, Pi.sub_apply, ENNReal.one_toReal, one_div] at this
rw [← ENNReal.rpow_mul, inv_mul_cancel (two_ne_zero : (2 : ℝ) ≠ 0), ENNReal.rpow_one] at this
simp_rw [ENNReal.rpow_two] at this
exact this
#align measure_theory.mem_ℒp.evariance_lt_top MeasureTheory.Memℒp.evariance_lt_top
theorem evariance_eq_top [IsFiniteMeasure μ] (hXm : AEStronglyMeasurable X μ) (hX : ¬Memℒp X 2 μ) :
evariance X μ = ∞ := by
by_contra h
rw [← Ne, ← lt_top_iff_ne_top] at h
have : Memℒp (fun ω => X ω - μ[X]) 2 μ := by
refine ⟨hXm.sub aestronglyMeasurable_const, ?_⟩
rw [snorm_eq_lintegral_rpow_nnnorm two_ne_zero ENNReal.two_ne_top]
simp only [coe_two, ENNReal.one_toReal, ENNReal.rpow_two, Ne]
exact ENNReal.rpow_lt_top_of_nonneg (by linarith) h.ne
refine hX ?_
-- Porting note: `μ[X]` without whitespace is ambiguous as it could be GetElem,
-- and `convert` cannot disambiguate based on typeclass inference failure.
convert this.add (memℒp_const <| μ [X])
ext ω
rw [Pi.add_apply, sub_add_cancel]
#align probability_theory.evariance_eq_top ProbabilityTheory.evariance_eq_top
theorem evariance_lt_top_iff_memℒp [IsFiniteMeasure μ] (hX : AEStronglyMeasurable X μ) :
evariance X μ < ∞ ↔ Memℒp X 2 μ := by
refine ⟨?_, MeasureTheory.Memℒp.evariance_lt_top⟩
contrapose
rw [not_lt, top_le_iff]
exact evariance_eq_top hX
#align probability_theory.evariance_lt_top_iff_mem_ℒp ProbabilityTheory.evariance_lt_top_iff_memℒp
theorem _root_.MeasureTheory.Memℒp.ofReal_variance_eq [IsFiniteMeasure μ] (hX : Memℒp X 2 μ) :
ENNReal.ofReal (variance X μ) = evariance X μ := by
rw [variance, ENNReal.ofReal_toReal]
exact hX.evariance_lt_top.ne
#align measure_theory.mem_ℒp.of_real_variance_eq MeasureTheory.Memℒp.ofReal_variance_eq
theorem evariance_eq_lintegral_ofReal (X : Ω → ℝ) (μ : Measure Ω) :
evariance X μ = ∫⁻ ω, ENNReal.ofReal ((X ω - μ[X]) ^ 2) ∂μ := by
rw [evariance]
congr
ext1 ω
rw [pow_two, ← ENNReal.coe_mul, ← nnnorm_mul, ← pow_two]
congr
exact (Real.toNNReal_eq_nnnorm_of_nonneg <| sq_nonneg _).symm
#align probability_theory.evariance_eq_lintegral_of_real ProbabilityTheory.evariance_eq_lintegral_ofReal
theorem _root_.MeasureTheory.Memℒp.variance_eq_of_integral_eq_zero (hX : Memℒp X 2 μ)
(hXint : μ[X] = 0) : variance X μ = μ[X ^ (2 : Nat)] := by
rw [variance, evariance_eq_lintegral_ofReal, ← ofReal_integral_eq_lintegral_ofReal,
ENNReal.toReal_ofReal (by positivity)] <;>
simp_rw [hXint, sub_zero]
· rfl
· convert hX.integrable_norm_rpow two_ne_zero ENNReal.two_ne_top with ω
simp only [Pi.sub_apply, Real.norm_eq_abs, coe_two, ENNReal.one_toReal,
Real.rpow_two, sq_abs, abs_pow]
· exact ae_of_all _ fun ω => pow_two_nonneg _
#align measure_theory.mem_ℒp.variance_eq_of_integral_eq_zero MeasureTheory.Memℒp.variance_eq_of_integral_eq_zero
theorem _root_.MeasureTheory.Memℒp.variance_eq [IsFiniteMeasure μ] (hX : Memℒp X 2 μ) :
variance X μ = μ[(X - fun _ => μ[X] :) ^ (2 : Nat)] := by
rw [variance, evariance_eq_lintegral_ofReal, ← ofReal_integral_eq_lintegral_ofReal,
ENNReal.toReal_ofReal (by positivity)]
· rfl
· -- Porting note: `μ[X]` without whitespace is ambiguous as it could be GetElem,
-- and `convert` cannot disambiguate based on typeclass inference failure.
convert (hX.sub <| memℒp_const (μ [X])).integrable_norm_rpow two_ne_zero ENNReal.two_ne_top
with ω
simp only [Pi.sub_apply, Real.norm_eq_abs, coe_two, ENNReal.one_toReal,
Real.rpow_two, sq_abs, abs_pow]
· exact ae_of_all _ fun ω => pow_two_nonneg _
#align measure_theory.mem_ℒp.variance_eq MeasureTheory.Memℒp.variance_eq
@[simp]
theorem evariance_zero : evariance 0 μ = 0 := by simp [evariance]
#align probability_theory.evariance_zero ProbabilityTheory.evariance_zero
theorem evariance_eq_zero_iff (hX : AEMeasurable X μ) :
evariance X μ = 0 ↔ X =ᵐ[μ] fun _ => μ[X] := by
rw [evariance, lintegral_eq_zero_iff']
constructor <;> intro hX <;> filter_upwards [hX] with ω hω
· simpa only [Pi.zero_apply, sq_eq_zero_iff, ENNReal.coe_eq_zero, nnnorm_eq_zero, sub_eq_zero]
using hω
· rw [hω]
simp
· exact (hX.sub_const _).ennnorm.pow_const _ -- TODO `measurability` and `fun_prop` fail
#align probability_theory.evariance_eq_zero_iff ProbabilityTheory.evariance_eq_zero_iff
theorem evariance_mul (c : ℝ) (X : Ω → ℝ) (μ : Measure Ω) :
evariance (fun ω => c * X ω) μ = ENNReal.ofReal (c ^ 2) * evariance X μ := by
rw [evariance, evariance, ← lintegral_const_mul' _ _ ENNReal.ofReal_lt_top.ne]
congr
ext1 ω
rw [ENNReal.ofReal, ← ENNReal.coe_pow, ← ENNReal.coe_pow, ← ENNReal.coe_mul]
congr
rw [← sq_abs, ← Real.rpow_two, Real.toNNReal_rpow_of_nonneg (abs_nonneg _), NNReal.rpow_two,
← mul_pow, Real.toNNReal_mul_nnnorm _ (abs_nonneg _)]
conv_rhs => rw [← nnnorm_norm, norm_mul, norm_abs_eq_norm, ← norm_mul, nnnorm_norm, mul_sub]
congr
rw [mul_comm]
simp_rw [← smul_eq_mul, ← integral_smul_const, smul_eq_mul, mul_comm]
#align probability_theory.evariance_mul ProbabilityTheory.evariance_mul
scoped notation "eVar[" X "]" => ProbabilityTheory.evariance X MeasureTheory.MeasureSpace.volume
@[simp]
theorem variance_zero (μ : Measure Ω) : variance 0 μ = 0 := by
simp only [variance, evariance_zero, ENNReal.zero_toReal]
#align probability_theory.variance_zero ProbabilityTheory.variance_zero
theorem variance_nonneg (X : Ω → ℝ) (μ : Measure Ω) : 0 ≤ variance X μ :=
ENNReal.toReal_nonneg
#align probability_theory.variance_nonneg ProbabilityTheory.variance_nonneg
theorem variance_mul (c : ℝ) (X : Ω → ℝ) (μ : Measure Ω) :
variance (fun ω => c * X ω) μ = c ^ 2 * variance X μ := by
rw [variance, evariance_mul, ENNReal.toReal_mul, ENNReal.toReal_ofReal (sq_nonneg _)]
rfl
#align probability_theory.variance_mul ProbabilityTheory.variance_mul
theorem variance_smul (c : ℝ) (X : Ω → ℝ) (μ : Measure Ω) :
variance (c • X) μ = c ^ 2 * variance X μ :=
variance_mul c X μ
#align probability_theory.variance_smul ProbabilityTheory.variance_smul
theorem variance_smul' {A : Type*} [CommSemiring A] [Algebra A ℝ] (c : A) (X : Ω → ℝ)
(μ : Measure Ω) : variance (c • X) μ = c ^ 2 • variance X μ := by
convert variance_smul (algebraMap A ℝ c) X μ using 1
· congr; simp only [algebraMap_smul]
· simp only [Algebra.smul_def, map_pow]
#align probability_theory.variance_smul' ProbabilityTheory.variance_smul'
scoped notation "Var[" X "]" => ProbabilityTheory.variance X MeasureTheory.MeasureSpace.volume
variable [MeasureSpace Ω]
theorem variance_def' [@IsProbabilityMeasure Ω _ ℙ] {X : Ω → ℝ} (hX : Memℒp X 2) :
Var[X] = 𝔼[X ^ 2] - 𝔼[X] ^ 2 := by
rw [hX.variance_eq, sub_sq', integral_sub', integral_add']; rotate_left
· exact hX.integrable_sq
· convert @integrable_const Ω ℝ (_) ℙ _ _ (𝔼[X] ^ 2)
· apply hX.integrable_sq.add
convert @integrable_const Ω ℝ (_) ℙ _ _ (𝔼[X] ^ 2)
· exact ((hX.integrable one_le_two).const_mul 2).mul_const' _
simp only [Pi.pow_apply, integral_const, measure_univ, ENNReal.one_toReal, smul_eq_mul, one_mul,
Pi.mul_apply, Pi.ofNat_apply, Nat.cast_ofNat, integral_mul_right, integral_mul_left]
ring
#align probability_theory.variance_def' ProbabilityTheory.variance_def'
theorem variance_le_expectation_sq [@IsProbabilityMeasure Ω _ ℙ] {X : Ω → ℝ}
(hm : AEStronglyMeasurable X ℙ) : Var[X] ≤ 𝔼[X ^ 2] := by
by_cases hX : Memℒp X 2
· rw [variance_def' hX]
simp only [sq_nonneg, sub_le_self_iff]
rw [variance, evariance_eq_lintegral_ofReal, ← integral_eq_lintegral_of_nonneg_ae]
· by_cases hint : Integrable X; swap
· simp only [integral_undef hint, Pi.pow_apply, Pi.sub_apply, sub_zero]
exact le_rfl
· rw [integral_undef]
· exact integral_nonneg fun a => sq_nonneg _
intro h
have A : Memℒp (X - fun ω : Ω => 𝔼[X]) 2 ℙ :=
(memℒp_two_iff_integrable_sq (hint.aestronglyMeasurable.sub aestronglyMeasurable_const)).2 h
have B : Memℒp (fun _ : Ω => 𝔼[X]) 2 ℙ := memℒp_const _
apply hX
convert A.add B
simp
· exact eventually_of_forall fun x => sq_nonneg _
· exact (AEMeasurable.pow_const (hm.aemeasurable.sub_const _) _).aestronglyMeasurable
#align probability_theory.variance_le_expectation_sq ProbabilityTheory.variance_le_expectation_sq
theorem evariance_def' [@IsProbabilityMeasure Ω _ ℙ] {X : Ω → ℝ} (hX : AEStronglyMeasurable X ℙ) :
eVar[X] = (∫⁻ ω, (‖X ω‖₊ ^ 2 :)) - ENNReal.ofReal (𝔼[X] ^ 2) := by
by_cases hℒ : Memℒp X 2
· rw [← hℒ.ofReal_variance_eq, variance_def' hℒ, ENNReal.ofReal_sub _ (sq_nonneg _)]
congr
rw [lintegral_coe_eq_integral]
· congr 2 with ω
simp only [Pi.pow_apply, NNReal.coe_pow, coe_nnnorm, Real.norm_eq_abs, Even.pow_abs even_two]
· exact hℒ.abs.integrable_sq
· symm
rw [evariance_eq_top hX hℒ, ENNReal.sub_eq_top_iff]
refine ⟨?_, ENNReal.ofReal_ne_top⟩
rw [Memℒp, not_and] at hℒ
specialize hℒ hX
simp only [snorm_eq_lintegral_rpow_nnnorm two_ne_zero ENNReal.two_ne_top, not_lt, top_le_iff,
coe_two, one_div, ENNReal.rpow_eq_top_iff, inv_lt_zero, inv_pos, and_true_iff,
or_iff_not_imp_left, not_and_or, zero_lt_two] at hℒ
exact mod_cast hℒ fun _ => zero_le_two
#align probability_theory.evariance_def' ProbabilityTheory.evariance_def'
| Mathlib/Probability/Variance.lean | 261 | 275 | theorem meas_ge_le_evariance_div_sq {X : Ω → ℝ} (hX : AEStronglyMeasurable X ℙ) {c : ℝ≥0}
(hc : c ≠ 0) : ℙ {ω | ↑c ≤ |X ω - 𝔼[X]|} ≤ eVar[X] / c ^ 2 := by |
have A : (c : ℝ≥0∞) ≠ 0 := by rwa [Ne, ENNReal.coe_eq_zero]
have B : AEStronglyMeasurable (fun _ : Ω => 𝔼[X]) ℙ := aestronglyMeasurable_const
convert meas_ge_le_mul_pow_snorm ℙ two_ne_zero ENNReal.two_ne_top (hX.sub B) A using 1
· congr
simp only [Pi.sub_apply, ENNReal.coe_le_coe, ← Real.norm_eq_abs, ← coe_nnnorm,
NNReal.coe_le_coe, ENNReal.ofReal_coe_nnreal]
· rw [snorm_eq_lintegral_rpow_nnnorm two_ne_zero ENNReal.two_ne_top]
simp only [show ENNReal.ofNNReal (c ^ 2) = (ENNReal.ofNNReal c) ^ 2 by norm_cast, coe_two,
one_div, Pi.sub_apply]
rw [div_eq_mul_inv, ENNReal.inv_pow, mul_comm, ENNReal.rpow_two]
congr
simp_rw [← ENNReal.rpow_mul, inv_mul_cancel (two_ne_zero : (2 : ℝ) ≠ 0), ENNReal.rpow_two,
ENNReal.rpow_one, evariance]
|
import Mathlib.Algebra.BigOperators.Fin
import Mathlib.Algebra.Order.BigOperators.Group.Finset
import Mathlib.Data.Finset.Sort
import Mathlib.Data.Set.Subsingleton
#align_import combinatorics.composition from "leanprover-community/mathlib"@"92ca63f0fb391a9ca5f22d2409a6080e786d99f7"
open List
variable {n : ℕ}
@[ext]
structure Composition (n : ℕ) where
blocks : List ℕ
blocks_pos : ∀ {i}, i ∈ blocks → 0 < i
blocks_sum : blocks.sum = n
#align composition Composition
@[ext]
structure CompositionAsSet (n : ℕ) where
boundaries : Finset (Fin n.succ)
zero_mem : (0 : Fin n.succ) ∈ boundaries
getLast_mem : Fin.last n ∈ boundaries
#align composition_as_set CompositionAsSet
instance {n : ℕ} : Inhabited (CompositionAsSet n) :=
⟨⟨Finset.univ, Finset.mem_univ _, Finset.mem_univ _⟩⟩
namespace Composition
variable (c : Composition n)
instance (n : ℕ) : ToString (Composition n) :=
⟨fun c => toString c.blocks⟩
abbrev length : ℕ :=
c.blocks.length
#align composition.length Composition.length
theorem blocks_length : c.blocks.length = c.length :=
rfl
#align composition.blocks_length Composition.blocks_length
def blocksFun : Fin c.length → ℕ := c.blocks.get
#align composition.blocks_fun Composition.blocksFun
theorem ofFn_blocksFun : ofFn c.blocksFun = c.blocks :=
ofFn_get _
#align composition.of_fn_blocks_fun Composition.ofFn_blocksFun
theorem sum_blocksFun : ∑ i, c.blocksFun i = n := by
conv_rhs => rw [← c.blocks_sum, ← ofFn_blocksFun, sum_ofFn]
#align composition.sum_blocks_fun Composition.sum_blocksFun
theorem blocksFun_mem_blocks (i : Fin c.length) : c.blocksFun i ∈ c.blocks :=
get_mem _ _ _
#align composition.blocks_fun_mem_blocks Composition.blocksFun_mem_blocks
@[simp]
theorem one_le_blocks {i : ℕ} (h : i ∈ c.blocks) : 1 ≤ i :=
c.blocks_pos h
#align composition.one_le_blocks Composition.one_le_blocks
@[simp]
theorem one_le_blocks' {i : ℕ} (h : i < c.length) : 1 ≤ c.blocks.get ⟨i, h⟩ :=
c.one_le_blocks (get_mem (blocks c) i h)
#align composition.one_le_blocks' Composition.one_le_blocks'
@[simp]
theorem blocks_pos' (i : ℕ) (h : i < c.length) : 0 < c.blocks.get ⟨i, h⟩ :=
c.one_le_blocks' h
#align composition.blocks_pos' Composition.blocks_pos'
theorem one_le_blocksFun (i : Fin c.length) : 1 ≤ c.blocksFun i :=
c.one_le_blocks (c.blocksFun_mem_blocks i)
#align composition.one_le_blocks_fun Composition.one_le_blocksFun
theorem length_le : c.length ≤ n := by
conv_rhs => rw [← c.blocks_sum]
exact length_le_sum_of_one_le _ fun i hi => c.one_le_blocks hi
#align composition.length_le Composition.length_le
theorem length_pos_of_pos (h : 0 < n) : 0 < c.length := by
apply length_pos_of_sum_pos
convert h
exact c.blocks_sum
#align composition.length_pos_of_pos Composition.length_pos_of_pos
def sizeUpTo (i : ℕ) : ℕ :=
(c.blocks.take i).sum
#align composition.size_up_to Composition.sizeUpTo
@[simp]
theorem sizeUpTo_zero : c.sizeUpTo 0 = 0 := by simp [sizeUpTo]
#align composition.size_up_to_zero Composition.sizeUpTo_zero
theorem sizeUpTo_ofLength_le (i : ℕ) (h : c.length ≤ i) : c.sizeUpTo i = n := by
dsimp [sizeUpTo]
convert c.blocks_sum
exact take_all_of_le h
#align composition.size_up_to_of_length_le Composition.sizeUpTo_ofLength_le
@[simp]
theorem sizeUpTo_length : c.sizeUpTo c.length = n :=
c.sizeUpTo_ofLength_le c.length le_rfl
#align composition.size_up_to_length Composition.sizeUpTo_length
theorem sizeUpTo_le (i : ℕ) : c.sizeUpTo i ≤ n := by
conv_rhs => rw [← c.blocks_sum, ← sum_take_add_sum_drop _ i]
exact Nat.le_add_right _ _
#align composition.size_up_to_le Composition.sizeUpTo_le
theorem sizeUpTo_succ {i : ℕ} (h : i < c.length) :
c.sizeUpTo (i + 1) = c.sizeUpTo i + c.blocks.get ⟨i, h⟩ := by
simp only [sizeUpTo]
rw [sum_take_succ _ _ h]
#align composition.size_up_to_succ Composition.sizeUpTo_succ
theorem sizeUpTo_succ' (i : Fin c.length) :
c.sizeUpTo ((i : ℕ) + 1) = c.sizeUpTo i + c.blocksFun i :=
c.sizeUpTo_succ i.2
#align composition.size_up_to_succ' Composition.sizeUpTo_succ'
theorem sizeUpTo_strict_mono {i : ℕ} (h : i < c.length) : c.sizeUpTo i < c.sizeUpTo (i + 1) := by
rw [c.sizeUpTo_succ h]
simp
#align composition.size_up_to_strict_mono Composition.sizeUpTo_strict_mono
theorem monotone_sizeUpTo : Monotone c.sizeUpTo :=
monotone_sum_take _
#align composition.monotone_size_up_to Composition.monotone_sizeUpTo
def boundary : Fin (c.length + 1) ↪o Fin (n + 1) :=
(OrderEmbedding.ofStrictMono fun i => ⟨c.sizeUpTo i, Nat.lt_succ_of_le (c.sizeUpTo_le i)⟩) <|
Fin.strictMono_iff_lt_succ.2 fun ⟨_, hi⟩ => c.sizeUpTo_strict_mono hi
#align composition.boundary Composition.boundary
@[simp]
theorem boundary_zero : c.boundary 0 = 0 := by simp [boundary, Fin.ext_iff]
#align composition.boundary_zero Composition.boundary_zero
@[simp]
theorem boundary_last : c.boundary (Fin.last c.length) = Fin.last n := by
simp [boundary, Fin.ext_iff]
#align composition.boundary_last Composition.boundary_last
def boundaries : Finset (Fin (n + 1)) :=
Finset.univ.map c.boundary.toEmbedding
#align composition.boundaries Composition.boundaries
| Mathlib/Combinatorics/Enumerative/Composition.lean | 267 | 267 | theorem card_boundaries_eq_succ_length : c.boundaries.card = c.length + 1 := by | simp [boundaries]
|
import Mathlib.Data.Complex.Basic
import Mathlib.Data.Real.Sqrt
#align_import data.complex.basic from "leanprover-community/mathlib"@"31c24aa72e7b3e5ed97a8412470e904f82b81004"
open Set ComplexConjugate
namespace Complex
namespace AbsTheory
-- We develop enough theory to bundle `abs` into an `AbsoluteValue` before making things public;
-- this is so there's not two versions of it hanging around.
local notation "abs" z => Real.sqrt (normSq z)
private theorem mul_self_abs (z : ℂ) : ((abs z) * abs z) = normSq z :=
Real.mul_self_sqrt (normSq_nonneg _)
private theorem abs_nonneg' (z : ℂ) : 0 ≤ abs z :=
Real.sqrt_nonneg _
| Mathlib/Data/Complex/Abs.lean | 34 | 34 | theorem abs_conj (z : ℂ) : (abs conj z) = abs z := by | simp
|
import Mathlib.AlgebraicGeometry.AffineScheme
import Mathlib.AlgebraicGeometry.Pullbacks
import Mathlib.CategoryTheory.MorphismProperty.Limits
import Mathlib.Data.List.TFAE
#align_import algebraic_geometry.morphisms.basic from "leanprover-community/mathlib"@"434e2fd21c1900747afc6d13d8be7f4eedba7218"
set_option linter.uppercaseLean3 false
universe u
open TopologicalSpace CategoryTheory CategoryTheory.Limits Opposite
noncomputable section
namespace AlgebraicGeometry
def AffineTargetMorphismProperty :=
∀ ⦃X Y : Scheme⦄ (_ : X ⟶ Y) [IsAffine Y], Prop
#align algebraic_geometry.affine_target_morphism_property AlgebraicGeometry.AffineTargetMorphismProperty
protected def Scheme.isIso : MorphismProperty Scheme :=
@IsIso Scheme _
#align algebraic_geometry.Scheme.is_iso AlgebraicGeometry.Scheme.isIso
protected def Scheme.affineTargetIsIso : AffineTargetMorphismProperty := fun _ _ f _ => IsIso f
#align algebraic_geometry.Scheme.affine_target_is_iso AlgebraicGeometry.Scheme.affineTargetIsIso
instance : Inhabited AffineTargetMorphismProperty := ⟨Scheme.affineTargetIsIso⟩
def AffineTargetMorphismProperty.toProperty (P : AffineTargetMorphismProperty) :
MorphismProperty Scheme := fun _ _ f => ∃ h, @P _ _ f h
#align algebraic_geometry.affine_target_morphism_property.to_property AlgebraicGeometry.AffineTargetMorphismProperty.toProperty
theorem AffineTargetMorphismProperty.toProperty_apply (P : AffineTargetMorphismProperty)
{X Y : Scheme} (f : X ⟶ Y) [i : IsAffine Y] : P.toProperty f ↔ P f := by
delta AffineTargetMorphismProperty.toProperty; simp [*]
#align algebraic_geometry.affine_target_morphism_property.to_property_apply AlgebraicGeometry.AffineTargetMorphismProperty.toProperty_apply
theorem affine_cancel_left_isIso {P : AffineTargetMorphismProperty} (hP : P.toProperty.RespectsIso)
{X Y Z : Scheme} (f : X ⟶ Y) (g : Y ⟶ Z) [IsIso f] [IsAffine Z] : P (f ≫ g) ↔ P g := by
rw [← P.toProperty_apply, ← P.toProperty_apply, hP.cancel_left_isIso]
#align algebraic_geometry.affine_cancel_left_is_iso AlgebraicGeometry.affine_cancel_left_isIso
theorem affine_cancel_right_isIso {P : AffineTargetMorphismProperty} (hP : P.toProperty.RespectsIso)
{X Y Z : Scheme} (f : X ⟶ Y) (g : Y ⟶ Z) [IsIso g] [IsAffine Z] [IsAffine Y] :
P (f ≫ g) ↔ P f := by rw [← P.toProperty_apply, ← P.toProperty_apply, hP.cancel_right_isIso]
#align algebraic_geometry.affine_cancel_right_is_iso AlgebraicGeometry.affine_cancel_right_isIso
theorem AffineTargetMorphismProperty.respectsIso_mk {P : AffineTargetMorphismProperty}
(h₁ : ∀ {X Y Z} (e : X ≅ Y) (f : Y ⟶ Z) [IsAffine Z], P f → P (e.hom ≫ f))
(h₂ : ∀ {X Y Z} (e : Y ≅ Z) (f : X ⟶ Y) [h : IsAffine Y],
P f → @P _ _ (f ≫ e.hom) (isAffineOfIso e.inv)) :
P.toProperty.RespectsIso := by
constructor
· rintro X Y Z e f ⟨a, h⟩; exact ⟨a, h₁ e f h⟩
· rintro X Y Z e f ⟨a, h⟩; exact ⟨isAffineOfIso e.inv, h₂ e f h⟩
#align algebraic_geometry.affine_target_morphism_property.respects_iso_mk AlgebraicGeometry.AffineTargetMorphismProperty.respectsIso_mk
def targetAffineLocally (P : AffineTargetMorphismProperty) : MorphismProperty Scheme :=
fun {X Y : Scheme} (f : X ⟶ Y) => ∀ U : Y.affineOpens, @P _ _ (f ∣_ U) U.prop
#align algebraic_geometry.target_affine_locally AlgebraicGeometry.targetAffineLocally
theorem IsAffineOpen.map_isIso {X Y : Scheme} {U : Opens Y.carrier} (hU : IsAffineOpen U)
(f : X ⟶ Y) [IsIso f] : IsAffineOpen ((Opens.map f.1.base).obj U) :=
haveI : IsAffine _ := hU
isAffineOfIso (f ∣_ U)
#align algebraic_geometry.is_affine_open.map_is_iso AlgebraicGeometry.IsAffineOpen.map_isIso
theorem targetAffineLocally_respectsIso {P : AffineTargetMorphismProperty}
(hP : P.toProperty.RespectsIso) : (targetAffineLocally P).RespectsIso := by
constructor
· introv H U
rw [morphismRestrict_comp, affine_cancel_left_isIso hP]
exact H U
· introv H
rintro ⟨U, hU : IsAffineOpen U⟩; dsimp
haveI : IsAffine _ := hU.map_isIso e.hom
rw [morphismRestrict_comp, affine_cancel_right_isIso hP]
exact H ⟨(Opens.map e.hom.val.base).obj U, hU.map_isIso e.hom⟩
#align algebraic_geometry.target_affine_locally_respects_iso AlgebraicGeometry.targetAffineLocally_respectsIso
structure AffineTargetMorphismProperty.IsLocal (P : AffineTargetMorphismProperty) : Prop where
RespectsIso : P.toProperty.RespectsIso
toBasicOpen :
∀ {X Y : Scheme} [IsAffine Y] (f : X ⟶ Y) (r : Y.presheaf.obj <| op ⊤),
P f → @P _ _ (f ∣_ Y.basicOpen r) ((topIsAffineOpen Y).basicOpenIsAffine _)
ofBasicOpenCover :
∀ {X Y : Scheme} [IsAffine Y] (f : X ⟶ Y) (s : Finset (Y.presheaf.obj <| op ⊤))
(_ : Ideal.span (s : Set (Y.presheaf.obj <| op ⊤)) = ⊤),
(∀ r : s, @P _ _ (f ∣_ Y.basicOpen r.1) ((topIsAffineOpen Y).basicOpenIsAffine _)) → P f
#align algebraic_geometry.affine_target_morphism_property.is_local AlgebraicGeometry.AffineTargetMorphismProperty.IsLocal
@[local simp] lemma CommRingCat.id_apply (R : CommRingCat) (x : R) : 𝟙 R x = x := rfl
theorem targetAffineLocallyOfOpenCover {P : AffineTargetMorphismProperty} (hP : P.IsLocal)
{X Y : Scheme} (f : X ⟶ Y) (𝒰 : Y.OpenCover) [∀ i, IsAffine (𝒰.obj i)]
(h𝒰 : ∀ i, P (pullback.snd : (𝒰.pullbackCover f).obj i ⟶ 𝒰.obj i)) :
targetAffineLocally P f := by
classical
let S i := (⟨⟨Set.range (𝒰.map i).1.base, (𝒰.IsOpen i).base_open.isOpen_range⟩,
rangeIsAffineOpenOfOpenImmersion (𝒰.map i)⟩ : Y.affineOpens)
intro U
apply of_affine_open_cover (P := _) U (Set.range S)
· intro U r h
haveI : IsAffine _ := U.2
have := hP.2 (f ∣_ U.1)
replace this := this (Y.presheaf.map (eqToHom U.1.openEmbedding_obj_top).op r) h
rw [← P.toProperty_apply] at this ⊢
exact (hP.1.arrow_mk_iso_iff (morphismRestrictRestrictBasicOpen f _ r)).mp this
· intro U s hs H
haveI : IsAffine _ := U.2
apply hP.3 (f ∣_ U.1) (s.image (Y.presheaf.map (eqToHom U.1.openEmbedding_obj_top).op))
· apply_fun Ideal.comap (Y.presheaf.map (eqToHom U.1.openEmbedding_obj_top.symm).op) at hs
rw [Ideal.comap_top] at hs
rw [← hs]
simp only [eqToHom_op, eqToHom_map, Finset.coe_image]
have : ∀ {R S : CommRingCat} (e : S = R) (s : Set S),
Ideal.span (eqToHom e '' s) = Ideal.comap (eqToHom e.symm) (Ideal.span s) := by
intro _ S e _
subst e
simp only [eqToHom_refl, CommRingCat.id_apply, Set.image_id']
-- Porting note: Lean didn't see `𝟙 _` is just ring hom id
exact (Ideal.comap_id _).symm
apply this
· rintro ⟨r, hr⟩
obtain ⟨r, hr', rfl⟩ := Finset.mem_image.mp hr
specialize H ⟨r, hr'⟩
rw [← P.toProperty_apply] at H ⊢
exact (hP.1.arrow_mk_iso_iff (morphismRestrictRestrictBasicOpen f _ r)).mpr H
· rw [Set.eq_univ_iff_forall]
simp only [Set.mem_iUnion]
intro x
exact ⟨⟨_, ⟨𝒰.f x, rfl⟩⟩, 𝒰.Covers x⟩
· rintro ⟨_, i, rfl⟩
specialize h𝒰 i
rw [← P.toProperty_apply] at h𝒰 ⊢
exact (hP.1.arrow_mk_iso_iff (morphismRestrictOpensRange f _)).mpr h𝒰
#align algebraic_geometry.target_affine_locally_of_open_cover AlgebraicGeometry.targetAffineLocallyOfOpenCover
open List in
theorem AffineTargetMorphismProperty.IsLocal.affine_openCover_TFAE
{P : AffineTargetMorphismProperty} (hP : P.IsLocal) {X Y : Scheme.{u}} (f : X ⟶ Y) :
TFAE
[targetAffineLocally P f,
∃ (𝒰 : Scheme.OpenCover.{u} Y) (_ : ∀ i, IsAffine (𝒰.obj i)),
∀ i : 𝒰.J, P (pullback.snd : (𝒰.pullbackCover f).obj i ⟶ 𝒰.obj i),
∀ (𝒰 : Scheme.OpenCover.{u} Y) [∀ i, IsAffine (𝒰.obj i)] (i : 𝒰.J),
P (pullback.snd : (𝒰.pullbackCover f).obj i ⟶ 𝒰.obj i),
∀ {U : Scheme} (g : U ⟶ Y) [IsAffine U] [IsOpenImmersion g],
P (pullback.snd : pullback f g ⟶ U),
∃ (ι : Type u) (U : ι → Opens Y.carrier) (_ : iSup U = ⊤) (hU' : ∀ i, IsAffineOpen (U i)),
∀ i, @P _ _ (f ∣_ U i) (hU' i)] := by
tfae_have 1 → 4
· intro H U g h₁ h₂
replace H := H ⟨⟨_, h₂.base_open.isOpen_range⟩, rangeIsAffineOpenOfOpenImmersion g⟩
rw [← P.toProperty_apply] at H ⊢
rwa [← hP.1.arrow_mk_iso_iff (morphismRestrictOpensRange f _)]
tfae_have 4 → 3
· intro H 𝒰 h𝒰 i
apply H
tfae_have 3 → 2
· exact fun H => ⟨Y.affineCover, inferInstance, H Y.affineCover⟩
tfae_have 2 → 1
· rintro ⟨𝒰, h𝒰, H⟩; exact targetAffineLocallyOfOpenCover hP f 𝒰 H
tfae_have 5 → 2
· rintro ⟨ι, U, hU, hU', H⟩
refine ⟨Y.openCoverOfSuprEqTop U hU, hU', ?_⟩
intro i
specialize H i
rw [← P.toProperty_apply, ← hP.1.arrow_mk_iso_iff (morphismRestrictOpensRange f _)]
rw [← P.toProperty_apply] at H
convert H
all_goals ext1; exact Subtype.range_coe
tfae_have 1 → 5
· intro H
refine ⟨Y.carrier, fun x => (Scheme.Hom.opensRange <| Y.affineCover.map x),
?_, fun i => rangeIsAffineOpenOfOpenImmersion _, ?_⟩
· rw [eq_top_iff]; intro x _; erw [Opens.mem_iSup]; exact ⟨x, Y.affineCover.Covers x⟩
· intro i; exact H ⟨_, rangeIsAffineOpenOfOpenImmersion _⟩
tfae_finish
#align algebraic_geometry.affine_target_morphism_property.is_local.affine_open_cover_tfae AlgebraicGeometry.AffineTargetMorphismProperty.IsLocal.affine_openCover_TFAE
theorem AffineTargetMorphismProperty.isLocalOfOpenCoverImply (P : AffineTargetMorphismProperty)
(hP : P.toProperty.RespectsIso)
(H : ∀ {X Y : Scheme.{u}} (f : X ⟶ Y),
(∃ (𝒰 : Scheme.OpenCover.{u} Y) (_ : ∀ i, IsAffine (𝒰.obj i)),
∀ i : 𝒰.J, P (pullback.snd : (𝒰.pullbackCover f).obj i ⟶ 𝒰.obj i)) →
∀ {U : Scheme} (g : U ⟶ Y) [IsAffine U] [IsOpenImmersion g],
P (pullback.snd : pullback f g ⟶ U)) :
P.IsLocal := by
refine ⟨hP, ?_, ?_⟩
· introv h
haveI : IsAffine _ := (topIsAffineOpen Y).basicOpenIsAffine r
delta morphismRestrict
rw [affine_cancel_left_isIso hP]
refine @H _ _ f ⟨Scheme.openCoverOfIsIso (𝟙 Y), ?_, ?_⟩ _ (Y.ofRestrict _) _ _
· intro i; dsimp; infer_instance
· intro i; dsimp
rwa [← Category.comp_id pullback.snd, ← pullback.condition, affine_cancel_left_isIso hP]
· introv hs hs'
replace hs := ((topIsAffineOpen Y).basicOpen_union_eq_self_iff _).mpr hs
have := H f ⟨Y.openCoverOfSuprEqTop _ hs, ?_, ?_⟩ (𝟙 _)
· rwa [← Category.comp_id pullback.snd, ← pullback.condition, affine_cancel_left_isIso hP]
at this
· intro i; exact (topIsAffineOpen Y).basicOpenIsAffine _
· rintro (i : s)
specialize hs' i
haveI : IsAffine _ := (topIsAffineOpen Y).basicOpenIsAffine i.1
delta morphismRestrict at hs'
rwa [affine_cancel_left_isIso hP] at hs'
#align algebraic_geometry.affine_target_morphism_property.is_local_of_open_cover_imply AlgebraicGeometry.AffineTargetMorphismProperty.isLocalOfOpenCoverImply
theorem AffineTargetMorphismProperty.IsLocal.affine_openCover_iff {P : AffineTargetMorphismProperty}
(hP : P.IsLocal) {X Y : Scheme.{u}} (f : X ⟶ Y) (𝒰 : Scheme.OpenCover.{u} Y)
[h𝒰 : ∀ i, IsAffine (𝒰.obj i)] :
targetAffineLocally P f ↔ ∀ i, @P _ _ (pullback.snd : pullback f (𝒰.map i) ⟶ _) (h𝒰 i) := by
refine ⟨fun H => let h := ((hP.affine_openCover_TFAE f).out 0 2).mp H; ?_,
fun H => let h := ((hP.affine_openCover_TFAE f).out 1 0).mp; ?_⟩
· exact fun i => h 𝒰 i
· exact h ⟨𝒰, inferInstance, H⟩
#align algebraic_geometry.affine_target_morphism_property.is_local.affine_open_cover_iff AlgebraicGeometry.AffineTargetMorphismProperty.IsLocal.affine_openCover_iff
theorem AffineTargetMorphismProperty.IsLocal.affine_target_iff {P : AffineTargetMorphismProperty}
(hP : P.IsLocal) {X Y : Scheme.{u}} (f : X ⟶ Y) [IsAffine Y] :
targetAffineLocally P f ↔ P f := by
haveI : ∀ i, IsAffine (Scheme.OpenCover.obj (Scheme.openCoverOfIsIso (𝟙 Y)) i) := fun i => by
dsimp; infer_instance
rw [hP.affine_openCover_iff f (Scheme.openCoverOfIsIso (𝟙 Y))]
trans P (pullback.snd : pullback f (𝟙 _) ⟶ _)
· exact ⟨fun H => H PUnit.unit, fun H _ => H⟩
rw [← Category.comp_id pullback.snd, ← pullback.condition, affine_cancel_left_isIso hP.1]
#align algebraic_geometry.affine_target_morphism_property.is_local.affine_target_iff AlgebraicGeometry.AffineTargetMorphismProperty.IsLocal.affine_target_iff
structure PropertyIsLocalAtTarget (P : MorphismProperty Scheme) : Prop where
RespectsIso : P.RespectsIso
restrict : ∀ {X Y : Scheme} (f : X ⟶ Y) (U : Opens Y.carrier), P f → P (f ∣_ U)
of_openCover :
∀ {X Y : Scheme.{u}} (f : X ⟶ Y) (𝒰 : Scheme.OpenCover.{u} Y),
(∀ i : 𝒰.J, P (pullback.snd : (𝒰.pullbackCover f).obj i ⟶ 𝒰.obj i)) → P f
#align algebraic_geometry.property_is_local_at_target AlgebraicGeometry.PropertyIsLocalAtTarget
lemma propertyIsLocalAtTarget_of_morphismRestrict (P : MorphismProperty Scheme)
(hP₁ : P.RespectsIso)
(hP₂ : ∀ {X Y : Scheme.{u}} (f : X ⟶ Y) (U : Opens Y.carrier), P f → P (f ∣_ U))
(hP₃ : ∀ {X Y : Scheme.{u}} (f : X ⟶ Y) {ι : Type u} (U : ι → Opens Y.carrier)
(_ : iSup U = ⊤), (∀ i, P (f ∣_ U i)) → P f) :
PropertyIsLocalAtTarget P where
RespectsIso := hP₁
restrict := hP₂
of_openCover {X Y} f 𝒰 h𝒰 := by
apply hP₃ f (fun i : 𝒰.J => Scheme.Hom.opensRange (𝒰.map i)) 𝒰.iSup_opensRange
simp_rw [hP₁.arrow_mk_iso_iff (morphismRestrictOpensRange f _)]
exact h𝒰
theorem AffineTargetMorphismProperty.IsLocal.targetAffineLocallyIsLocal
{P : AffineTargetMorphismProperty} (hP : P.IsLocal) :
PropertyIsLocalAtTarget (targetAffineLocally P) := by
constructor
· exact targetAffineLocally_respectsIso hP.1
· intro X Y f U H V
rw [← P.toProperty_apply (i := V.2), hP.1.arrow_mk_iso_iff (morphismRestrictRestrict f _ _)]
convert H ⟨_, IsAffineOpen.imageIsOpenImmersion V.2 (Y.ofRestrict _)⟩
rw [← P.toProperty_apply]
· rintro X Y f 𝒰 h𝒰
-- Porting note: rewrite `[(hP.affine_openCover_TFAE f).out 0 1` directly complains about
-- metavariables
have h01 := (hP.affine_openCover_TFAE f).out 0 1
rw [h01]
refine ⟨𝒰.bind fun _ => Scheme.affineCover _, ?_, ?_⟩
· intro i; dsimp [Scheme.OpenCover.bind]; infer_instance
· intro i
specialize h𝒰 i.1
-- Porting note: rewrite `[(hP.affine_openCover_TFAE pullback.snd).out 0 1` directly
-- complains about metavariables
have h02 := (hP.affine_openCover_TFAE (pullback.snd : pullback f (𝒰.map i.fst) ⟶ _)).out 0 2
rw [h02] at h𝒰
specialize h𝒰 (Scheme.affineCover _) i.2
let e : pullback f ((𝒰.obj i.fst).affineCover.map i.snd ≫ 𝒰.map i.fst) ⟶
pullback (pullback.snd : pullback f (𝒰.map i.fst) ⟶ _)
((𝒰.obj i.fst).affineCover.map i.snd) := by
refine (pullbackSymmetry _ _).hom ≫ ?_
refine (pullbackRightPullbackFstIso _ _ _).inv ≫ ?_
refine (pullbackSymmetry _ _).hom ≫ ?_
refine pullback.map _ _ _ _ (pullbackSymmetry _ _).hom (𝟙 _) (𝟙 _) ?_ ?_ <;>
simp only [Category.comp_id, Category.id_comp, pullbackSymmetry_hom_comp_snd]
rw [← affine_cancel_left_isIso hP.1 e] at h𝒰
convert h𝒰 using 1
simp [e]
#align algebraic_geometry.affine_target_morphism_property.is_local.target_affine_locally_is_local AlgebraicGeometry.AffineTargetMorphismProperty.IsLocal.targetAffineLocallyIsLocal
open List in
theorem PropertyIsLocalAtTarget.openCover_TFAE {P : MorphismProperty Scheme}
(hP : PropertyIsLocalAtTarget P) {X Y : Scheme.{u}} (f : X ⟶ Y) :
TFAE
[P f,
∃ 𝒰 : Scheme.OpenCover.{u} Y,
∀ i : 𝒰.J, P (pullback.snd : (𝒰.pullbackCover f).obj i ⟶ 𝒰.obj i),
∀ (𝒰 : Scheme.OpenCover.{u} Y) (i : 𝒰.J),
P (pullback.snd : (𝒰.pullbackCover f).obj i ⟶ 𝒰.obj i),
∀ U : Opens Y.carrier, P (f ∣_ U),
∀ {U : Scheme} (g : U ⟶ Y) [IsOpenImmersion g], P (pullback.snd : pullback f g ⟶ U),
∃ (ι : Type u) (U : ι → Opens Y.carrier) (_ : iSup U = ⊤), ∀ i, P (f ∣_ U i)] := by
tfae_have 2 → 1
· rintro ⟨𝒰, H⟩; exact hP.3 f 𝒰 H
tfae_have 1 → 4
· intro H U; exact hP.2 f U H
tfae_have 4 → 3
· intro H 𝒰 i
rw [← hP.1.arrow_mk_iso_iff (morphismRestrictOpensRange f _)]
exact H <| Scheme.Hom.opensRange (𝒰.map i)
tfae_have 3 → 2
· exact fun H => ⟨Y.affineCover, H Y.affineCover⟩
tfae_have 4 → 5
· intro H U g hg
rw [← hP.1.arrow_mk_iso_iff (morphismRestrictOpensRange f _)]
apply H
tfae_have 5 → 4
· intro H U
erw [hP.1.cancel_left_isIso]
apply H
tfae_have 4 → 6
· intro H; exact ⟨PUnit, fun _ => ⊤, ciSup_const, fun _ => H _⟩
tfae_have 6 → 2
· rintro ⟨ι, U, hU, H⟩
refine ⟨Y.openCoverOfSuprEqTop U hU, ?_⟩
intro i
rw [← hP.1.arrow_mk_iso_iff (morphismRestrictOpensRange f _)]
convert H i
all_goals ext1; exact Subtype.range_coe
tfae_finish
#align algebraic_geometry.property_is_local_at_target.open_cover_tfae AlgebraicGeometry.PropertyIsLocalAtTarget.openCover_TFAE
theorem PropertyIsLocalAtTarget.openCover_iff {P : MorphismProperty Scheme}
(hP : PropertyIsLocalAtTarget P) {X Y : Scheme.{u}} (f : X ⟶ Y) (𝒰 : Scheme.OpenCover.{u} Y) :
P f ↔ ∀ i, P (pullback.snd : pullback f (𝒰.map i) ⟶ _) := by
-- Porting note: couldn't get the term mode proof work
refine ⟨fun H => let h := ((hP.openCover_TFAE f).out 0 2).mp H; fun i => ?_,
fun H => let h := ((hP.openCover_TFAE f).out 1 0).mp; ?_⟩
· exact h 𝒰 i
· exact h ⟨𝒰, H⟩
#align algebraic_geometry.property_is_local_at_target.open_cover_iff AlgebraicGeometry.PropertyIsLocalAtTarget.openCover_iff
namespace AffineTargetMorphismProperty
def StableUnderBaseChange (P : AffineTargetMorphismProperty) : Prop :=
∀ ⦃X Y S : Scheme⦄ [IsAffine S] [IsAffine X] (f : X ⟶ S) (g : Y ⟶ S),
P g → P (pullback.fst : pullback f g ⟶ X)
#align algebraic_geometry.affine_target_morphism_property.stable_under_base_change AlgebraicGeometry.AffineTargetMorphismProperty.StableUnderBaseChange
| Mathlib/AlgebraicGeometry/Morphisms/Basic.lean | 434 | 446 | theorem IsLocal.targetAffineLocallyPullbackFstOfRightOfStableUnderBaseChange
{P : AffineTargetMorphismProperty} (hP : P.IsLocal) (hP' : P.StableUnderBaseChange)
{X Y S : Scheme} (f : X ⟶ S) (g : Y ⟶ S) [IsAffine S] (H : P g) :
targetAffineLocally P (pullback.fst : pullback f g ⟶ X) := by |
-- Porting note: rewrite `(hP.affine_openCover_TFAE ...).out 0 1` doesn't work
have h01 := (hP.affine_openCover_TFAE (pullback.fst : pullback f g ⟶ X)).out 0 1
rw [h01]
use X.affineCover, inferInstance
intro i
let e := pullbackSymmetry _ _ ≪≫ pullbackRightPullbackFstIso f g (X.affineCover.map i)
have : e.hom ≫ pullback.fst = pullback.snd := by simp [e]
rw [← this, affine_cancel_left_isIso hP.1]
apply hP'; assumption
|
import Mathlib.Algebra.Ring.Prod
import Mathlib.GroupTheory.OrderOfElement
import Mathlib.Tactic.FinCases
#align_import data.zmod.basic from "leanprover-community/mathlib"@"74ad1c88c77e799d2fea62801d1dbbd698cff1b7"
assert_not_exists Submodule
open Function
namespace ZMod
instance charZero : CharZero (ZMod 0) := inferInstanceAs (CharZero ℤ)
def val : ∀ {n : ℕ}, ZMod n → ℕ
| 0 => Int.natAbs
| n + 1 => ((↑) : Fin (n + 1) → ℕ)
#align zmod.val ZMod.val
theorem val_lt {n : ℕ} [NeZero n] (a : ZMod n) : a.val < n := by
cases n
· cases NeZero.ne 0 rfl
exact Fin.is_lt a
#align zmod.val_lt ZMod.val_lt
theorem val_le {n : ℕ} [NeZero n] (a : ZMod n) : a.val ≤ n :=
a.val_lt.le
#align zmod.val_le ZMod.val_le
@[simp]
theorem val_zero : ∀ {n}, (0 : ZMod n).val = 0
| 0 => rfl
| _ + 1 => rfl
#align zmod.val_zero ZMod.val_zero
@[simp]
theorem val_one' : (1 : ZMod 0).val = 1 :=
rfl
#align zmod.val_one' ZMod.val_one'
@[simp]
theorem val_neg' {n : ZMod 0} : (-n).val = n.val :=
Int.natAbs_neg n
#align zmod.val_neg' ZMod.val_neg'
@[simp]
theorem val_mul' {m n : ZMod 0} : (m * n).val = m.val * n.val :=
Int.natAbs_mul m n
#align zmod.val_mul' ZMod.val_mul'
@[simp]
| Mathlib/Data/ZMod/Basic.lean | 84 | 88 | theorem val_natCast {n : ℕ} (a : ℕ) : (a : ZMod n).val = a % n := by |
cases n
· rw [Nat.mod_zero]
exact Int.natAbs_ofNat a
· apply Fin.val_natCast
|
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}
namespace ContinuousLinearEquiv
variable (iso : E ≃L[𝕜] F)
@[fun_prop]
protected theorem hasStrictFDerivAt : HasStrictFDerivAt iso (iso : E →L[𝕜] F) x :=
iso.toContinuousLinearMap.hasStrictFDerivAt
#align continuous_linear_equiv.has_strict_fderiv_at ContinuousLinearEquiv.hasStrictFDerivAt
@[fun_prop]
protected theorem hasFDerivWithinAt : HasFDerivWithinAt iso (iso : E →L[𝕜] F) s x :=
iso.toContinuousLinearMap.hasFDerivWithinAt
#align continuous_linear_equiv.has_fderiv_within_at ContinuousLinearEquiv.hasFDerivWithinAt
@[fun_prop]
protected theorem hasFDerivAt : HasFDerivAt iso (iso : E →L[𝕜] F) x :=
iso.toContinuousLinearMap.hasFDerivAtFilter
#align continuous_linear_equiv.has_fderiv_at ContinuousLinearEquiv.hasFDerivAt
@[fun_prop]
protected theorem differentiableAt : DifferentiableAt 𝕜 iso x :=
iso.hasFDerivAt.differentiableAt
#align continuous_linear_equiv.differentiable_at ContinuousLinearEquiv.differentiableAt
@[fun_prop]
protected theorem differentiableWithinAt : DifferentiableWithinAt 𝕜 iso s x :=
iso.differentiableAt.differentiableWithinAt
#align continuous_linear_equiv.differentiable_within_at ContinuousLinearEquiv.differentiableWithinAt
protected theorem fderiv : fderiv 𝕜 iso x = iso :=
iso.hasFDerivAt.fderiv
#align continuous_linear_equiv.fderiv ContinuousLinearEquiv.fderiv
protected theorem fderivWithin (hxs : UniqueDiffWithinAt 𝕜 s x) : fderivWithin 𝕜 iso s x = iso :=
iso.toContinuousLinearMap.fderivWithin hxs
#align continuous_linear_equiv.fderiv_within ContinuousLinearEquiv.fderivWithin
@[fun_prop]
protected theorem differentiable : Differentiable 𝕜 iso := fun _ => iso.differentiableAt
#align continuous_linear_equiv.differentiable ContinuousLinearEquiv.differentiable
@[fun_prop]
protected theorem differentiableOn : DifferentiableOn 𝕜 iso s :=
iso.differentiable.differentiableOn
#align continuous_linear_equiv.differentiable_on ContinuousLinearEquiv.differentiableOn
theorem comp_differentiableWithinAt_iff {f : G → E} {s : Set G} {x : G} :
DifferentiableWithinAt 𝕜 (iso ∘ f) s x ↔ DifferentiableWithinAt 𝕜 f s x := by
refine
⟨fun H => ?_, fun H => iso.differentiable.differentiableAt.comp_differentiableWithinAt x H⟩
have : DifferentiableWithinAt 𝕜 (iso.symm ∘ iso ∘ f) s x :=
iso.symm.differentiable.differentiableAt.comp_differentiableWithinAt x H
rwa [← Function.comp.assoc iso.symm iso f, iso.symm_comp_self] at this
#align continuous_linear_equiv.comp_differentiable_within_at_iff ContinuousLinearEquiv.comp_differentiableWithinAt_iff
theorem comp_differentiableAt_iff {f : G → E} {x : G} :
DifferentiableAt 𝕜 (iso ∘ f) x ↔ DifferentiableAt 𝕜 f x := by
rw [← differentiableWithinAt_univ, ← differentiableWithinAt_univ,
iso.comp_differentiableWithinAt_iff]
#align continuous_linear_equiv.comp_differentiable_at_iff ContinuousLinearEquiv.comp_differentiableAt_iff
theorem comp_differentiableOn_iff {f : G → E} {s : Set G} :
DifferentiableOn 𝕜 (iso ∘ f) s ↔ DifferentiableOn 𝕜 f s := by
rw [DifferentiableOn, DifferentiableOn]
simp only [iso.comp_differentiableWithinAt_iff]
#align continuous_linear_equiv.comp_differentiable_on_iff ContinuousLinearEquiv.comp_differentiableOn_iff
theorem comp_differentiable_iff {f : G → E} : Differentiable 𝕜 (iso ∘ f) ↔ Differentiable 𝕜 f := by
rw [← differentiableOn_univ, ← differentiableOn_univ]
exact iso.comp_differentiableOn_iff
#align continuous_linear_equiv.comp_differentiable_iff ContinuousLinearEquiv.comp_differentiable_iff
theorem comp_hasFDerivWithinAt_iff {f : G → E} {s : Set G} {x : G} {f' : G →L[𝕜] E} :
HasFDerivWithinAt (iso ∘ f) ((iso : E →L[𝕜] F).comp f') s x ↔ HasFDerivWithinAt f f' s x := by
refine ⟨fun H => ?_, fun H => iso.hasFDerivAt.comp_hasFDerivWithinAt x H⟩
have A : f = iso.symm ∘ iso ∘ f := by
rw [← Function.comp.assoc, iso.symm_comp_self]
rfl
have B : f' = (iso.symm : F →L[𝕜] E).comp ((iso : E →L[𝕜] F).comp f') := by
rw [← ContinuousLinearMap.comp_assoc, iso.coe_symm_comp_coe, ContinuousLinearMap.id_comp]
rw [A, B]
exact iso.symm.hasFDerivAt.comp_hasFDerivWithinAt x H
#align continuous_linear_equiv.comp_has_fderiv_within_at_iff ContinuousLinearEquiv.comp_hasFDerivWithinAt_iff
theorem comp_hasStrictFDerivAt_iff {f : G → E} {x : G} {f' : G →L[𝕜] E} :
HasStrictFDerivAt (iso ∘ f) ((iso : E →L[𝕜] F).comp f') x ↔ HasStrictFDerivAt f f' x := by
refine ⟨fun H => ?_, fun H => iso.hasStrictFDerivAt.comp x H⟩
convert iso.symm.hasStrictFDerivAt.comp x H using 1 <;>
ext z <;> apply (iso.symm_apply_apply _).symm
#align continuous_linear_equiv.comp_has_strict_fderiv_at_iff ContinuousLinearEquiv.comp_hasStrictFDerivAt_iff
theorem comp_hasFDerivAt_iff {f : G → E} {x : G} {f' : G →L[𝕜] E} :
HasFDerivAt (iso ∘ f) ((iso : E →L[𝕜] F).comp f') x ↔ HasFDerivAt f f' x := by
simp_rw [← hasFDerivWithinAt_univ, iso.comp_hasFDerivWithinAt_iff]
#align continuous_linear_equiv.comp_has_fderiv_at_iff ContinuousLinearEquiv.comp_hasFDerivAt_iff
theorem comp_hasFDerivWithinAt_iff' {f : G → E} {s : Set G} {x : G} {f' : G →L[𝕜] F} :
HasFDerivWithinAt (iso ∘ f) f' s x ↔
HasFDerivWithinAt f ((iso.symm : F →L[𝕜] E).comp f') s x := by
rw [← iso.comp_hasFDerivWithinAt_iff, ← ContinuousLinearMap.comp_assoc, iso.coe_comp_coe_symm,
ContinuousLinearMap.id_comp]
#align continuous_linear_equiv.comp_has_fderiv_within_at_iff' ContinuousLinearEquiv.comp_hasFDerivWithinAt_iff'
theorem comp_hasFDerivAt_iff' {f : G → E} {x : G} {f' : G →L[𝕜] F} :
HasFDerivAt (iso ∘ f) f' x ↔ HasFDerivAt f ((iso.symm : F →L[𝕜] E).comp f') x := by
simp_rw [← hasFDerivWithinAt_univ, iso.comp_hasFDerivWithinAt_iff']
#align continuous_linear_equiv.comp_has_fderiv_at_iff' ContinuousLinearEquiv.comp_hasFDerivAt_iff'
theorem comp_fderivWithin {f : G → E} {s : Set G} {x : G} (hxs : UniqueDiffWithinAt 𝕜 s x) :
fderivWithin 𝕜 (iso ∘ f) s x = (iso : E →L[𝕜] F).comp (fderivWithin 𝕜 f s x) := by
by_cases h : DifferentiableWithinAt 𝕜 f s x
· rw [fderiv.comp_fderivWithin x iso.differentiableAt h hxs, iso.fderiv]
· have : ¬DifferentiableWithinAt 𝕜 (iso ∘ f) s x := mt iso.comp_differentiableWithinAt_iff.1 h
rw [fderivWithin_zero_of_not_differentiableWithinAt h,
fderivWithin_zero_of_not_differentiableWithinAt this, ContinuousLinearMap.comp_zero]
#align continuous_linear_equiv.comp_fderiv_within ContinuousLinearEquiv.comp_fderivWithin
| Mathlib/Analysis/Calculus/FDeriv/Equiv.lean | 166 | 169 | theorem comp_fderiv {f : G → E} {x : G} :
fderiv 𝕜 (iso ∘ f) x = (iso : E →L[𝕜] F).comp (fderiv 𝕜 f x) := by |
rw [← fderivWithin_univ, ← fderivWithin_univ]
exact iso.comp_fderivWithin uniqueDiffWithinAt_univ
|
import Mathlib.Algebra.Polynomial.FieldDivision
import Mathlib.FieldTheory.Minpoly.Basic
import Mathlib.RingTheory.Algebraic
#align_import field_theory.minpoly.field from "leanprover-community/mathlib"@"cbdf7b565832144d024caa5a550117c6df0204a5"
open scoped Classical
open Polynomial Set Function minpoly
namespace minpoly
variable {A B : Type*}
variable (A) [Field A]
section Ring
variable [Ring B] [Algebra A B] (x : B)
theorem degree_le_of_ne_zero {p : A[X]} (pnz : p ≠ 0) (hp : Polynomial.aeval x p = 0) :
degree (minpoly A x) ≤ degree p :=
calc
degree (minpoly A x) ≤ degree (p * C (leadingCoeff p)⁻¹) :=
min A x (monic_mul_leadingCoeff_inv pnz) (by simp [hp])
_ = degree p := degree_mul_leadingCoeff_inv p pnz
#align minpoly.degree_le_of_ne_zero minpoly.degree_le_of_ne_zero
theorem ne_zero_of_finite (e : B) [FiniteDimensional A B] : minpoly A e ≠ 0 :=
minpoly.ne_zero <| .of_finite A _
#align minpoly.ne_zero_of_finite_field_extension minpoly.ne_zero_of_finite
theorem unique {p : A[X]} (pmonic : p.Monic) (hp : Polynomial.aeval x p = 0)
(pmin : ∀ q : A[X], q.Monic → Polynomial.aeval x q = 0 → degree p ≤ degree q) :
p = minpoly A x := by
have hx : IsIntegral A x := ⟨p, pmonic, hp⟩
symm; apply eq_of_sub_eq_zero
by_contra hnz
apply degree_le_of_ne_zero A x hnz (by simp [hp]) |>.not_lt
apply degree_sub_lt _ (minpoly.ne_zero hx)
· rw [(monic hx).leadingCoeff, pmonic.leadingCoeff]
· exact le_antisymm (min A x pmonic hp) (pmin (minpoly A x) (monic hx) (aeval A x))
#align minpoly.unique minpoly.unique
theorem dvd {p : A[X]} (hp : Polynomial.aeval x p = 0) : minpoly A x ∣ p := by
by_cases hp0 : p = 0
· simp only [hp0, dvd_zero]
have hx : IsIntegral A x := IsAlgebraic.isIntegral ⟨p, hp0, hp⟩
rw [← modByMonic_eq_zero_iff_dvd (monic hx)]
by_contra hnz
apply degree_le_of_ne_zero A x hnz
((aeval_modByMonic_eq_self_of_root (monic hx) (aeval _ _)).trans hp) |>.not_lt
exact degree_modByMonic_lt _ (monic hx)
#align minpoly.dvd minpoly.dvd
variable {A x} in
lemma dvd_iff {p : A[X]} : minpoly A x ∣ p ↔ Polynomial.aeval x p = 0 :=
⟨fun ⟨q, hq⟩ ↦ by rw [hq, map_mul, aeval, zero_mul], minpoly.dvd A x⟩
theorem isRadical [IsReduced B] : IsRadical (minpoly A x) := fun n p dvd ↦ by
rw [dvd_iff] at dvd ⊢; rw [map_pow] at dvd; exact IsReduced.eq_zero _ ⟨n, dvd⟩
theorem dvd_map_of_isScalarTower (A K : Type*) {R : Type*} [CommRing A] [Field K] [CommRing R]
[Algebra A K] [Algebra A R] [Algebra K R] [IsScalarTower A K R] (x : R) :
minpoly K x ∣ (minpoly A x).map (algebraMap A K) := by
refine minpoly.dvd K x ?_
rw [aeval_map_algebraMap, minpoly.aeval]
#align minpoly.dvd_map_of_is_scalar_tower minpoly.dvd_map_of_isScalarTower
theorem dvd_map_of_isScalarTower' (R : Type*) {S : Type*} (K L : Type*) [CommRing R]
[CommRing S] [Field K] [CommRing L] [Algebra R S] [Algebra R K] [Algebra S L] [Algebra K L]
[Algebra R L] [IsScalarTower R K L] [IsScalarTower R S L] (s : S) :
minpoly K (algebraMap S L s) ∣ map (algebraMap R K) (minpoly R s) := by
apply minpoly.dvd K (algebraMap S L s)
rw [← map_aeval_eq_aeval_map, minpoly.aeval, map_zero]
rw [← IsScalarTower.algebraMap_eq, ← IsScalarTower.algebraMap_eq]
#align minpoly.dvd_map_of_is_scalar_tower' minpoly.dvd_map_of_isScalarTower'
theorem aeval_of_isScalarTower (R : Type*) {K T U : Type*} [CommRing R] [Field K] [CommRing T]
[Algebra R K] [Algebra K T] [Algebra R T] [IsScalarTower R K T] [CommSemiring U] [Algebra K U]
[Algebra R U] [IsScalarTower R K U] (x : T) (y : U)
(hy : Polynomial.aeval y (minpoly K x) = 0) : Polynomial.aeval y (minpoly R x) = 0 :=
aeval_map_algebraMap K y (minpoly R x) ▸
eval₂_eq_zero_of_dvd_of_eval₂_eq_zero (algebraMap K U) y
(minpoly.dvd_map_of_isScalarTower R K x) hy
#align minpoly.aeval_of_is_scalar_tower minpoly.aeval_of_isScalarTower
@[simp]
lemma ker_aeval_eq_span_minpoly :
RingHom.ker (Polynomial.aeval x) = A[X] ∙ minpoly A x := by
ext p
simp_rw [RingHom.mem_ker, ← minpoly.dvd_iff, Submodule.mem_span_singleton,
dvd_iff_exists_eq_mul_left, smul_eq_mul, eq_comm (a := p)]
variable {A x}
theorem eq_of_irreducible_of_monic [Nontrivial B] {p : A[X]} (hp1 : Irreducible p)
(hp2 : Polynomial.aeval x p = 0) (hp3 : p.Monic) : p = minpoly A x :=
let ⟨_, hq⟩ := dvd A x hp2
eq_of_monic_of_associated hp3 (monic ⟨p, ⟨hp3, hp2⟩⟩) <|
mul_one (minpoly A x) ▸ hq.symm ▸ Associated.mul_left _
(associated_one_iff_isUnit.2 <| (hp1.isUnit_or_isUnit hq).resolve_left <| not_isUnit A x)
#align minpoly.eq_of_irreducible_of_monic minpoly.eq_of_irreducible_of_monic
theorem eq_of_irreducible [Nontrivial B] {p : A[X]} (hp1 : Irreducible p)
(hp2 : Polynomial.aeval x p = 0) : p * C p.leadingCoeff⁻¹ = minpoly A x := by
have : p.leadingCoeff ≠ 0 := leadingCoeff_ne_zero.mpr hp1.ne_zero
apply eq_of_irreducible_of_monic
· exact Associated.irreducible ⟨⟨C p.leadingCoeff⁻¹, C p.leadingCoeff,
by rwa [← C_mul, inv_mul_cancel, C_1], by rwa [← C_mul, mul_inv_cancel, C_1]⟩, rfl⟩ hp1
· rw [aeval_mul, hp2, zero_mul]
· rwa [Polynomial.Monic, leadingCoeff_mul, leadingCoeff_C, mul_inv_cancel]
#align minpoly.eq_of_irreducible minpoly.eq_of_irreducible
| Mathlib/FieldTheory/Minpoly/Field.lean | 141 | 152 | theorem add_algebraMap {B : Type*} [CommRing B] [Algebra A B] {x : B} (hx : IsIntegral A x)
(a : A) : minpoly A (x + algebraMap A B a) = (minpoly A x).comp (X - C a) := by |
refine (minpoly.unique _ _ ((minpoly.monic hx).comp_X_sub_C _) ?_ fun q qmo hq => ?_).symm
· simp [aeval_comp]
· have : (Polynomial.aeval x) (q.comp (X + C a)) = 0 := by simpa [aeval_comp] using hq
have H := minpoly.min A x (qmo.comp_X_add_C _) this
rw [degree_eq_natDegree qmo.ne_zero,
degree_eq_natDegree ((minpoly.monic hx).comp_X_sub_C _).ne_zero, natDegree_comp,
natDegree_X_sub_C, mul_one]
rwa [degree_eq_natDegree (minpoly.ne_zero hx),
degree_eq_natDegree (qmo.comp_X_add_C _).ne_zero, natDegree_comp,
natDegree_X_add_C, mul_one] at H
|
import Mathlib.Analysis.Convex.Between
import Mathlib.Analysis.Convex.Jensen
import Mathlib.Analysis.Convex.Topology
import Mathlib.Analysis.Normed.Group.Pointwise
import Mathlib.Analysis.NormedSpace.AddTorsor
#align_import analysis.convex.normed from "leanprover-community/mathlib"@"a63928c34ec358b5edcda2bf7513c50052a5230f"
variable {ι : Type*} {E P : Type*}
open Metric Set
open scoped Convex
variable [SeminormedAddCommGroup E] [NormedSpace ℝ E] [PseudoMetricSpace P] [NormedAddTorsor E P]
variable {s t : Set E}
theorem convexOn_norm (hs : Convex ℝ s) : ConvexOn ℝ s norm :=
⟨hs, fun x _ y _ a b ha hb _ =>
calc
‖a • x + b • y‖ ≤ ‖a • x‖ + ‖b • y‖ := norm_add_le _ _
_ = a * ‖x‖ + b * ‖y‖ := by
rw [norm_smul, norm_smul, Real.norm_of_nonneg ha, Real.norm_of_nonneg hb]⟩
#align convex_on_norm convexOn_norm
theorem convexOn_univ_norm : ConvexOn ℝ univ (norm : E → ℝ) :=
convexOn_norm convex_univ
#align convex_on_univ_norm convexOn_univ_norm
theorem convexOn_dist (z : E) (hs : Convex ℝ s) : ConvexOn ℝ s fun z' => dist z' z := by
simpa [dist_eq_norm, preimage_preimage] using
(convexOn_norm (hs.translate (-z))).comp_affineMap (AffineMap.id ℝ E - AffineMap.const ℝ E z)
#align convex_on_dist convexOn_dist
theorem convexOn_univ_dist (z : E) : ConvexOn ℝ univ fun z' => dist z' z :=
convexOn_dist z convex_univ
#align convex_on_univ_dist convexOn_univ_dist
theorem convex_ball (a : E) (r : ℝ) : Convex ℝ (Metric.ball a r) := by
simpa only [Metric.ball, sep_univ] using (convexOn_univ_dist a).convex_lt r
#align convex_ball convex_ball
| Mathlib/Analysis/Convex/Normed.lean | 66 | 67 | theorem convex_closedBall (a : E) (r : ℝ) : Convex ℝ (Metric.closedBall a r) := by |
simpa only [Metric.closedBall, sep_univ] using (convexOn_univ_dist a).convex_le r
|
import Mathlib.Topology.Category.TopCat.OpenNhds
import Mathlib.Topology.Sheaves.Presheaf
import Mathlib.Topology.Sheaves.SheafCondition.UniqueGluing
import Mathlib.CategoryTheory.Adjunction.Evaluation
import Mathlib.CategoryTheory.Limits.Types
import Mathlib.CategoryTheory.Limits.Preserves.Filtered
import Mathlib.CategoryTheory.Limits.Final
import Mathlib.Tactic.CategoryTheory.Elementwise
import Mathlib.Algebra.Category.Ring.Colimits
import Mathlib.CategoryTheory.Sites.Pullback
#align_import topology.sheaves.stalks from "leanprover-community/mathlib"@"5dc6092d09e5e489106865241986f7f2ad28d4c8"
noncomputable section
universe v u v' u'
open CategoryTheory
open TopCat
open CategoryTheory.Limits
open TopologicalSpace
open Opposite
variable {C : Type u} [Category.{v} C]
variable [HasColimits.{v} C]
variable {X Y Z : TopCat.{v}}
namespace TopCat.Presheaf
variable (C)
def stalkFunctor (x : X) : X.Presheaf C ⥤ C :=
(whiskeringLeft _ _ C).obj (OpenNhds.inclusion x).op ⋙ colim
set_option linter.uppercaseLean3 false in
#align Top.presheaf.stalk_functor TopCat.Presheaf.stalkFunctor
variable {C}
def stalk (ℱ : X.Presheaf C) (x : X) : C :=
(stalkFunctor C x).obj ℱ
set_option linter.uppercaseLean3 false in
#align Top.presheaf.stalk TopCat.Presheaf.stalk
-- -- colimit ((open_nhds.inclusion x).op ⋙ ℱ)
@[simp]
theorem stalkFunctor_obj (ℱ : X.Presheaf C) (x : X) : (stalkFunctor C x).obj ℱ = ℱ.stalk x :=
rfl
set_option linter.uppercaseLean3 false in
#align Top.presheaf.stalk_functor_obj TopCat.Presheaf.stalkFunctor_obj
def germ (F : X.Presheaf C) {U : Opens X} (x : U) : F.obj (op U) ⟶ stalk F x :=
colimit.ι ((OpenNhds.inclusion x.1).op ⋙ F) (op ⟨U, x.2⟩)
set_option linter.uppercaseLean3 false in
#align Top.presheaf.germ TopCat.Presheaf.germ
theorem germ_res (F : X.Presheaf C) {U V : Opens X} (i : U ⟶ V) (x : U) :
F.map i.op ≫ germ F x = germ F (i x : V) :=
let i' : (⟨U, x.2⟩ : OpenNhds x.1) ⟶ ⟨V, (i x : V).2⟩ := i
colimit.w ((OpenNhds.inclusion x.1).op ⋙ F) i'.op
set_option linter.uppercaseLean3 false in
#align Top.presheaf.germ_res TopCat.Presheaf.germ_res
-- Porting note: `@[elementwise]` did not generate the best lemma when applied to `germ_res`
attribute [local instance] ConcreteCategory.instFunLike in
theorem germ_res_apply (F : X.Presheaf C) {U V : Opens X} (i : U ⟶ V) (x : U) [ConcreteCategory C]
(s) : germ F x (F.map i.op s) = germ F (i x) s := by rw [← comp_apply, germ_res]
set_option linter.uppercaseLean3 false in
#align Top.presheaf.germ_res_apply TopCat.Presheaf.germ_res_apply
@[ext]
theorem stalk_hom_ext (F : X.Presheaf C) {x} {Y : C} {f₁ f₂ : F.stalk x ⟶ Y}
(ih : ∀ (U : Opens X) (hxU : x ∈ U), F.germ ⟨x, hxU⟩ ≫ f₁ = F.germ ⟨x, hxU⟩ ≫ f₂) : f₁ = f₂ :=
colimit.hom_ext fun U => by
induction' U using Opposite.rec with U; cases' U with U hxU; exact ih U hxU
set_option linter.uppercaseLean3 false in
#align Top.presheaf.stalk_hom_ext TopCat.Presheaf.stalk_hom_ext
@[reassoc (attr := simp), elementwise (attr := simp)]
theorem stalkFunctor_map_germ {F G : X.Presheaf C} (U : Opens X) (x : U) (f : F ⟶ G) :
germ F x ≫ (stalkFunctor C x.1).map f = f.app (op U) ≫ germ G x :=
colimit.ι_map (whiskerLeft (OpenNhds.inclusion x.1).op f) (op ⟨U, x.2⟩)
set_option linter.uppercaseLean3 false in
#align Top.presheaf.stalk_functor_map_germ TopCat.Presheaf.stalkFunctor_map_germ
variable (C)
def stalkPushforward (f : X ⟶ Y) (F : X.Presheaf C) (x : X) : (f _* F).stalk (f x) ⟶ F.stalk x := by
-- This is a hack; Lean doesn't like to elaborate the term written directly.
-- Porting note: The original proof was `trans; swap`, but `trans` does nothing.
refine ?_ ≫ colimit.pre _ (OpenNhds.map f x).op
exact colim.map (whiskerRight (NatTrans.op (OpenNhds.inclusionMapIso f x).inv) F)
set_option linter.uppercaseLean3 false in
#align Top.presheaf.stalk_pushforward TopCat.Presheaf.stalkPushforward
@[reassoc (attr := simp), elementwise (attr := simp)]
theorem stalkPushforward_germ (f : X ⟶ Y) (F : X.Presheaf C) (U : Opens Y)
(x : (Opens.map f).obj U) :
(f _* F).germ ⟨(f : X → Y) (x : X), x.2⟩ ≫ F.stalkPushforward C f x = F.germ x := by
simp [germ, stalkPushforward]
set_option linter.uppercaseLean3 false in
#align Top.presheaf.stalk_pushforward_germ TopCat.Presheaf.stalkPushforward_germ
-- Here are two other potential solutions, suggested by @fpvandoorn at
-- <https://github.com/leanprover-community/mathlib/pull/1018#discussion_r283978240>
-- However, I can't get the subsequent two proofs to work with either one.
-- def stalkPushforward'' (f : X ⟶ Y) (ℱ : X.Presheaf C) (x : X) :
-- (f _* ℱ).stalk (f x) ⟶ ℱ.stalk x :=
-- colim.map ((Functor.associator _ _ _).inv ≫
-- whiskerRight (NatTrans.op (OpenNhds.inclusionMapIso f x).inv) ℱ) ≫
-- colimit.pre ((OpenNhds.inclusion x).op ⋙ ℱ) (OpenNhds.map f x).op
-- def stalkPushforward''' (f : X ⟶ Y) (ℱ : X.Presheaf C) (x : X) :
-- (f _* ℱ).stalk (f x) ⟶ ℱ.stalk x :=
-- (colim.map (whiskerRight (NatTrans.op (OpenNhds.inclusionMapIso f x).inv) ℱ) :
-- colim.obj ((OpenNhds.inclusion (f x) ⋙ Opens.map f).op ⋙ ℱ) ⟶ _) ≫
-- colimit.pre ((OpenNhds.inclusion x).op ⋙ ℱ) (OpenNhds.map f x).op
section Concrete
variable {C}
variable [ConcreteCategory.{v} C]
attribute [local instance] ConcreteCategory.hasCoeToSort ConcreteCategory.instFunLike
-- Porting note (#11215): TODO: @[ext] attribute only applies to structures or lemmas proving x = y
-- @[ext]
theorem germ_ext (F : X.Presheaf C) {U V : Opens X} {x : X} {hxU : x ∈ U} {hxV : x ∈ V}
(W : Opens X) (hxW : x ∈ W) (iWU : W ⟶ U) (iWV : W ⟶ V) {sU : F.obj (op U)} {sV : F.obj (op V)}
(ih : F.map iWU.op sU = F.map iWV.op sV) :
F.germ ⟨x, hxU⟩ sU = F.germ ⟨x, hxV⟩ sV := by
erw [← F.germ_res iWU ⟨x, hxW⟩, ← F.germ_res iWV ⟨x, hxW⟩, comp_apply, comp_apply, ih]
set_option linter.uppercaseLean3 false in
#align Top.presheaf.germ_ext TopCat.Presheaf.germ_ext
variable [PreservesFilteredColimits (forget C)]
theorem germ_exist (F : X.Presheaf C) (x : X) (t : (stalk.{v, u} F x : Type v)) :
∃ (U : Opens X) (m : x ∈ U) (s : F.obj (op U)), F.germ ⟨x, m⟩ s = t := by
obtain ⟨U, s, e⟩ :=
Types.jointly_surjective.{v, v} _ (isColimitOfPreserves (forget C) (colimit.isColimit _)) t
revert s e
induction U with | h U => ?_
cases' U with V m
intro s e
exact ⟨V, m, s, e⟩
set_option linter.uppercaseLean3 false in
#align Top.presheaf.germ_exist TopCat.Presheaf.germ_exist
| Mathlib/Topology/Sheaves/Stalks.lean | 419 | 425 | theorem germ_eq (F : X.Presheaf C) {U V : Opens X} (x : X) (mU : x ∈ U) (mV : x ∈ V)
(s : F.obj (op U)) (t : F.obj (op V)) (h : germ F ⟨x, mU⟩ s = germ F ⟨x, mV⟩ t) :
∃ (W : Opens X) (_m : x ∈ W) (iU : W ⟶ U) (iV : W ⟶ V), F.map iU.op s = F.map iV.op t := by |
obtain ⟨W, iU, iV, e⟩ :=
(Types.FilteredColimit.isColimit_eq_iff.{v, v} _
(isColimitOfPreserves _ (colimit.isColimit ((OpenNhds.inclusion x).op ⋙ F)))).mp h
exact ⟨(unop W).1, (unop W).2, iU.unop, iV.unop, e⟩
|
import Mathlib.Algebra.Group.Basic
import Mathlib.Algebra.Group.Hom.Defs
#align_import algebra.hom.group from "leanprover-community/mathlib"@"a148d797a1094ab554ad4183a4ad6f130358ef64"
-- `NeZero` cannot be additivised, hence its theory should be developed outside of the
-- `Algebra.Group` folder.
assert_not_exists NeZero
variable {α β M N P : Type*}
-- monoids
variable {G : Type*} {H : Type*}
-- groups
variable {F : Type*}
namespace MulHom
@[to_additive "Given two additive morphisms `f`, `g` to an additive commutative semigroup,
`f + g` is the additive morphism sending `x` to `f x + g x`."]
instance [Mul M] [CommSemigroup N] : Mul (M →ₙ* N) :=
⟨fun f g =>
{ toFun := fun m => f m * g m,
map_mul' := fun x y => by
show f (x * y) * g (x * y) = f x * g x * (f y * g y)
rw [f.map_mul, g.map_mul, ← mul_assoc, ← mul_assoc, mul_right_comm (f x)] }⟩
@[to_additive (attr := simp)]
theorem mul_apply {M N} [Mul M] [CommSemigroup N] (f g : M →ₙ* N) (x : M) :
(f * g) x = f x * g x := rfl
#align mul_hom.mul_apply MulHom.mul_apply
#align add_hom.add_apply AddHom.add_apply
@[to_additive]
theorem mul_comp [Mul M] [Mul N] [CommSemigroup P] (g₁ g₂ : N →ₙ* P) (f : M →ₙ* N) :
(g₁ * g₂).comp f = g₁.comp f * g₂.comp f := rfl
#align mul_hom.mul_comp MulHom.mul_comp
#align add_hom.add_comp AddHom.add_comp
@[to_additive]
| Mathlib/Algebra/Group/Hom/Basic.lean | 110 | 113 | theorem comp_mul [Mul M] [CommSemigroup N] [CommSemigroup P] (g : N →ₙ* P) (f₁ f₂ : M →ₙ* N) :
g.comp (f₁ * f₂) = g.comp f₁ * g.comp f₂ := by |
ext
simp only [mul_apply, Function.comp_apply, map_mul, coe_comp]
|
import Mathlib.Logic.Pairwise
import Mathlib.Order.CompleteBooleanAlgebra
import Mathlib.Order.Directed
import Mathlib.Order.GaloisConnection
#align_import data.set.lattice from "leanprover-community/mathlib"@"b86832321b586c6ac23ef8cdef6a7a27e42b13bd"
open Function Set
universe u
variable {α β γ : Type*} {ι ι' ι₂ : Sort*} {κ κ₁ κ₂ : ι → Sort*} {κ' : ι' → Sort*}
namespace Set
theorem mem_iUnion₂ {x : γ} {s : ∀ i, κ i → Set γ} : (x ∈ ⋃ (i) (j), s i j) ↔ ∃ i j, x ∈ s i j := by
simp_rw [mem_iUnion]
#align set.mem_Union₂ Set.mem_iUnion₂
theorem mem_iInter₂ {x : γ} {s : ∀ i, κ i → Set γ} : (x ∈ ⋂ (i) (j), s i j) ↔ ∀ i j, x ∈ s i j := by
simp_rw [mem_iInter]
#align set.mem_Inter₂ Set.mem_iInter₂
theorem mem_iUnion_of_mem {s : ι → Set α} {a : α} (i : ι) (ha : a ∈ s i) : a ∈ ⋃ i, s i :=
mem_iUnion.2 ⟨i, ha⟩
#align set.mem_Union_of_mem Set.mem_iUnion_of_mem
theorem mem_iUnion₂_of_mem {s : ∀ i, κ i → Set α} {a : α} {i : ι} (j : κ i) (ha : a ∈ s i j) :
a ∈ ⋃ (i) (j), s i j :=
mem_iUnion₂.2 ⟨i, j, ha⟩
#align set.mem_Union₂_of_mem Set.mem_iUnion₂_of_mem
theorem mem_iInter_of_mem {s : ι → Set α} {a : α} (h : ∀ i, a ∈ s i) : a ∈ ⋂ i, s i :=
mem_iInter.2 h
#align set.mem_Inter_of_mem Set.mem_iInter_of_mem
theorem mem_iInter₂_of_mem {s : ∀ i, κ i → Set α} {a : α} (h : ∀ i j, a ∈ s i j) :
a ∈ ⋂ (i) (j), s i j :=
mem_iInter₂.2 h
#align set.mem_Inter₂_of_mem Set.mem_iInter₂_of_mem
instance completeAtomicBooleanAlgebra : CompleteAtomicBooleanAlgebra (Set α) :=
{ instBooleanAlgebraSet with
le_sSup := fun s t t_in a a_in => ⟨t, t_in, a_in⟩
sSup_le := fun s t h a ⟨t', ⟨t'_in, a_in⟩⟩ => h t' t'_in a_in
le_sInf := fun s t h a a_in t' t'_in => h t' t'_in a_in
sInf_le := fun s t t_in a h => h _ t_in
iInf_iSup_eq := by intros; ext; simp [Classical.skolem] }
instance : OrderTop (Set α) where
top := univ
le_top := by simp
@[congr]
theorem iUnion_congr_Prop {p q : Prop} {f₁ : p → Set α} {f₂ : q → Set α} (pq : p ↔ q)
(f : ∀ x, f₁ (pq.mpr x) = f₂ x) : iUnion f₁ = iUnion f₂ :=
iSup_congr_Prop pq f
#align set.Union_congr_Prop Set.iUnion_congr_Prop
@[congr]
theorem iInter_congr_Prop {p q : Prop} {f₁ : p → Set α} {f₂ : q → Set α} (pq : p ↔ q)
(f : ∀ x, f₁ (pq.mpr x) = f₂ x) : iInter f₁ = iInter f₂ :=
iInf_congr_Prop pq f
#align set.Inter_congr_Prop Set.iInter_congr_Prop
theorem iUnion_plift_up (f : PLift ι → Set α) : ⋃ i, f (PLift.up i) = ⋃ i, f i :=
iSup_plift_up _
#align set.Union_plift_up Set.iUnion_plift_up
theorem iUnion_plift_down (f : ι → Set α) : ⋃ i, f (PLift.down i) = ⋃ i, f i :=
iSup_plift_down _
#align set.Union_plift_down Set.iUnion_plift_down
theorem iInter_plift_up (f : PLift ι → Set α) : ⋂ i, f (PLift.up i) = ⋂ i, f i :=
iInf_plift_up _
#align set.Inter_plift_up Set.iInter_plift_up
theorem iInter_plift_down (f : ι → Set α) : ⋂ i, f (PLift.down i) = ⋂ i, f i :=
iInf_plift_down _
#align set.Inter_plift_down Set.iInter_plift_down
theorem iUnion_eq_if {p : Prop} [Decidable p] (s : Set α) : ⋃ _ : p, s = if p then s else ∅ :=
iSup_eq_if _
#align set.Union_eq_if Set.iUnion_eq_if
theorem iUnion_eq_dif {p : Prop} [Decidable p] (s : p → Set α) :
⋃ h : p, s h = if h : p then s h else ∅ :=
iSup_eq_dif _
#align set.Union_eq_dif Set.iUnion_eq_dif
theorem iInter_eq_if {p : Prop} [Decidable p] (s : Set α) : ⋂ _ : p, s = if p then s else univ :=
iInf_eq_if _
#align set.Inter_eq_if Set.iInter_eq_if
theorem iInf_eq_dif {p : Prop} [Decidable p] (s : p → Set α) :
⋂ h : p, s h = if h : p then s h else univ :=
_root_.iInf_eq_dif _
#align set.Infi_eq_dif Set.iInf_eq_dif
theorem exists_set_mem_of_union_eq_top {ι : Type*} (t : Set ι) (s : ι → Set β)
(w : ⋃ i ∈ t, s i = ⊤) (x : β) : ∃ i ∈ t, x ∈ s i := by
have p : x ∈ ⊤ := Set.mem_univ x
rw [← w, Set.mem_iUnion] at p
simpa using p
#align set.exists_set_mem_of_union_eq_top Set.exists_set_mem_of_union_eq_top
theorem nonempty_of_union_eq_top_of_nonempty {ι : Type*} (t : Set ι) (s : ι → Set α)
(H : Nonempty α) (w : ⋃ i ∈ t, s i = ⊤) : t.Nonempty := by
obtain ⟨x, m, -⟩ := exists_set_mem_of_union_eq_top t s w H.some
exact ⟨x, m⟩
#align set.nonempty_of_union_eq_top_of_nonempty Set.nonempty_of_union_eq_top_of_nonempty
theorem nonempty_of_nonempty_iUnion
{s : ι → Set α} (h_Union : (⋃ i, s i).Nonempty) : Nonempty ι := by
obtain ⟨x, hx⟩ := h_Union
exact ⟨Classical.choose <| mem_iUnion.mp hx⟩
theorem nonempty_of_nonempty_iUnion_eq_univ
{s : ι → Set α} [Nonempty α] (h_Union : ⋃ i, s i = univ) : Nonempty ι :=
nonempty_of_nonempty_iUnion (s := s) (by simpa only [h_Union] using univ_nonempty)
theorem setOf_exists (p : ι → β → Prop) : { x | ∃ i, p i x } = ⋃ i, { x | p i x } :=
ext fun _ => mem_iUnion.symm
#align set.set_of_exists Set.setOf_exists
theorem setOf_forall (p : ι → β → Prop) : { x | ∀ i, p i x } = ⋂ i, { x | p i x } :=
ext fun _ => mem_iInter.symm
#align set.set_of_forall Set.setOf_forall
theorem iUnion_subset {s : ι → Set α} {t : Set α} (h : ∀ i, s i ⊆ t) : ⋃ i, s i ⊆ t :=
iSup_le h
#align set.Union_subset Set.iUnion_subset
theorem iUnion₂_subset {s : ∀ i, κ i → Set α} {t : Set α} (h : ∀ i j, s i j ⊆ t) :
⋃ (i) (j), s i j ⊆ t :=
iUnion_subset fun x => iUnion_subset (h x)
#align set.Union₂_subset Set.iUnion₂_subset
theorem subset_iInter {t : Set β} {s : ι → Set β} (h : ∀ i, t ⊆ s i) : t ⊆ ⋂ i, s i :=
le_iInf h
#align set.subset_Inter Set.subset_iInter
theorem subset_iInter₂ {s : Set α} {t : ∀ i, κ i → Set α} (h : ∀ i j, s ⊆ t i j) :
s ⊆ ⋂ (i) (j), t i j :=
subset_iInter fun x => subset_iInter <| h x
#align set.subset_Inter₂ Set.subset_iInter₂
@[simp]
theorem iUnion_subset_iff {s : ι → Set α} {t : Set α} : ⋃ i, s i ⊆ t ↔ ∀ i, s i ⊆ t :=
⟨fun h _ => Subset.trans (le_iSup s _) h, iUnion_subset⟩
#align set.Union_subset_iff Set.iUnion_subset_iff
theorem iUnion₂_subset_iff {s : ∀ i, κ i → Set α} {t : Set α} :
⋃ (i) (j), s i j ⊆ t ↔ ∀ i j, s i j ⊆ t := by simp_rw [iUnion_subset_iff]
#align set.Union₂_subset_iff Set.iUnion₂_subset_iff
@[simp]
theorem subset_iInter_iff {s : Set α} {t : ι → Set α} : (s ⊆ ⋂ i, t i) ↔ ∀ i, s ⊆ t i :=
le_iInf_iff
#align set.subset_Inter_iff Set.subset_iInter_iff
-- Porting note (#10618): removing `simp`. `simp` can prove it
theorem subset_iInter₂_iff {s : Set α} {t : ∀ i, κ i → Set α} :
(s ⊆ ⋂ (i) (j), t i j) ↔ ∀ i j, s ⊆ t i j := by simp_rw [subset_iInter_iff]
#align set.subset_Inter₂_iff Set.subset_iInter₂_iff
theorem subset_iUnion : ∀ (s : ι → Set β) (i : ι), s i ⊆ ⋃ i, s i :=
le_iSup
#align set.subset_Union Set.subset_iUnion
theorem iInter_subset : ∀ (s : ι → Set β) (i : ι), ⋂ i, s i ⊆ s i :=
iInf_le
#align set.Inter_subset Set.iInter_subset
theorem subset_iUnion₂ {s : ∀ i, κ i → Set α} (i : ι) (j : κ i) : s i j ⊆ ⋃ (i') (j'), s i' j' :=
le_iSup₂ i j
#align set.subset_Union₂ Set.subset_iUnion₂
theorem iInter₂_subset {s : ∀ i, κ i → Set α} (i : ι) (j : κ i) : ⋂ (i) (j), s i j ⊆ s i j :=
iInf₂_le i j
#align set.Inter₂_subset Set.iInter₂_subset
theorem subset_iUnion_of_subset {s : Set α} {t : ι → Set α} (i : ι) (h : s ⊆ t i) : s ⊆ ⋃ i, t i :=
le_iSup_of_le i h
#align set.subset_Union_of_subset Set.subset_iUnion_of_subset
theorem iInter_subset_of_subset {s : ι → Set α} {t : Set α} (i : ι) (h : s i ⊆ t) :
⋂ i, s i ⊆ t :=
iInf_le_of_le i h
#align set.Inter_subset_of_subset Set.iInter_subset_of_subset
theorem subset_iUnion₂_of_subset {s : Set α} {t : ∀ i, κ i → Set α} (i : ι) (j : κ i)
(h : s ⊆ t i j) : s ⊆ ⋃ (i) (j), t i j :=
le_iSup₂_of_le i j h
#align set.subset_Union₂_of_subset Set.subset_iUnion₂_of_subset
theorem iInter₂_subset_of_subset {s : ∀ i, κ i → Set α} {t : Set α} (i : ι) (j : κ i)
(h : s i j ⊆ t) : ⋂ (i) (j), s i j ⊆ t :=
iInf₂_le_of_le i j h
#align set.Inter₂_subset_of_subset Set.iInter₂_subset_of_subset
theorem iUnion_mono {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : ⋃ i, s i ⊆ ⋃ i, t i :=
iSup_mono h
#align set.Union_mono Set.iUnion_mono
@[gcongr]
theorem iUnion_mono'' {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : iUnion s ⊆ iUnion t :=
iSup_mono h
theorem iUnion₂_mono {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j ⊆ t i j) :
⋃ (i) (j), s i j ⊆ ⋃ (i) (j), t i j :=
iSup₂_mono h
#align set.Union₂_mono Set.iUnion₂_mono
theorem iInter_mono {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : ⋂ i, s i ⊆ ⋂ i, t i :=
iInf_mono h
#align set.Inter_mono Set.iInter_mono
@[gcongr]
theorem iInter_mono'' {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : iInter s ⊆ iInter t :=
iInf_mono h
theorem iInter₂_mono {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j ⊆ t i j) :
⋂ (i) (j), s i j ⊆ ⋂ (i) (j), t i j :=
iInf₂_mono h
#align set.Inter₂_mono Set.iInter₂_mono
theorem iUnion_mono' {s : ι → Set α} {t : ι₂ → Set α} (h : ∀ i, ∃ j, s i ⊆ t j) :
⋃ i, s i ⊆ ⋃ i, t i :=
iSup_mono' h
#align set.Union_mono' Set.iUnion_mono'
theorem iUnion₂_mono' {s : ∀ i, κ i → Set α} {t : ∀ i', κ' i' → Set α}
(h : ∀ i j, ∃ i' j', s i j ⊆ t i' j') : ⋃ (i) (j), s i j ⊆ ⋃ (i') (j'), t i' j' :=
iSup₂_mono' h
#align set.Union₂_mono' Set.iUnion₂_mono'
theorem iInter_mono' {s : ι → Set α} {t : ι' → Set α} (h : ∀ j, ∃ i, s i ⊆ t j) :
⋂ i, s i ⊆ ⋂ j, t j :=
Set.subset_iInter fun j =>
let ⟨i, hi⟩ := h j
iInter_subset_of_subset i hi
#align set.Inter_mono' Set.iInter_mono'
theorem iInter₂_mono' {s : ∀ i, κ i → Set α} {t : ∀ i', κ' i' → Set α}
(h : ∀ i' j', ∃ i j, s i j ⊆ t i' j') : ⋂ (i) (j), s i j ⊆ ⋂ (i') (j'), t i' j' :=
subset_iInter₂_iff.2 fun i' j' =>
let ⟨_, _, hst⟩ := h i' j'
(iInter₂_subset _ _).trans hst
#align set.Inter₂_mono' Set.iInter₂_mono'
theorem iUnion₂_subset_iUnion (κ : ι → Sort*) (s : ι → Set α) :
⋃ (i) (_ : κ i), s i ⊆ ⋃ i, s i :=
iUnion_mono fun _ => iUnion_subset fun _ => Subset.rfl
#align set.Union₂_subset_Union Set.iUnion₂_subset_iUnion
theorem iInter_subset_iInter₂ (κ : ι → Sort*) (s : ι → Set α) :
⋂ i, s i ⊆ ⋂ (i) (_ : κ i), s i :=
iInter_mono fun _ => subset_iInter fun _ => Subset.rfl
#align set.Inter_subset_Inter₂ Set.iInter_subset_iInter₂
theorem iUnion_setOf (P : ι → α → Prop) : ⋃ i, { x : α | P i x } = { x : α | ∃ i, P i x } := by
ext
exact mem_iUnion
#align set.Union_set_of Set.iUnion_setOf
theorem iInter_setOf (P : ι → α → Prop) : ⋂ i, { x : α | P i x } = { x : α | ∀ i, P i x } := by
ext
exact mem_iInter
#align set.Inter_set_of Set.iInter_setOf
theorem iUnion_congr_of_surjective {f : ι → Set α} {g : ι₂ → Set α} (h : ι → ι₂) (h1 : Surjective h)
(h2 : ∀ x, g (h x) = f x) : ⋃ x, f x = ⋃ y, g y :=
h1.iSup_congr h h2
#align set.Union_congr_of_surjective Set.iUnion_congr_of_surjective
theorem iInter_congr_of_surjective {f : ι → Set α} {g : ι₂ → Set α} (h : ι → ι₂) (h1 : Surjective h)
(h2 : ∀ x, g (h x) = f x) : ⋂ x, f x = ⋂ y, g y :=
h1.iInf_congr h h2
#align set.Inter_congr_of_surjective Set.iInter_congr_of_surjective
lemma iUnion_congr {s t : ι → Set α} (h : ∀ i, s i = t i) : ⋃ i, s i = ⋃ i, t i := iSup_congr h
#align set.Union_congr Set.iUnion_congr
lemma iInter_congr {s t : ι → Set α} (h : ∀ i, s i = t i) : ⋂ i, s i = ⋂ i, t i := iInf_congr h
#align set.Inter_congr Set.iInter_congr
lemma iUnion₂_congr {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j = t i j) :
⋃ (i) (j), s i j = ⋃ (i) (j), t i j :=
iUnion_congr fun i => iUnion_congr <| h i
#align set.Union₂_congr Set.iUnion₂_congr
lemma iInter₂_congr {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j = t i j) :
⋂ (i) (j), s i j = ⋂ (i) (j), t i j :=
iInter_congr fun i => iInter_congr <| h i
#align set.Inter₂_congr Set.iInter₂_congr
@[simp]
theorem compl_iUnion (s : ι → Set β) : (⋃ i, s i)ᶜ = ⋂ i, (s i)ᶜ :=
compl_iSup
#align set.compl_Union Set.compl_iUnion
theorem compl_iUnion₂ (s : ∀ i, κ i → Set α) : (⋃ (i) (j), s i j)ᶜ = ⋂ (i) (j), (s i j)ᶜ := by
simp_rw [compl_iUnion]
#align set.compl_Union₂ Set.compl_iUnion₂
@[simp]
theorem compl_iInter (s : ι → Set β) : (⋂ i, s i)ᶜ = ⋃ i, (s i)ᶜ :=
compl_iInf
#align set.compl_Inter Set.compl_iInter
theorem compl_iInter₂ (s : ∀ i, κ i → Set α) : (⋂ (i) (j), s i j)ᶜ = ⋃ (i) (j), (s i j)ᶜ := by
simp_rw [compl_iInter]
#align set.compl_Inter₂ Set.compl_iInter₂
-- classical -- complete_boolean_algebra
theorem iUnion_eq_compl_iInter_compl (s : ι → Set β) : ⋃ i, s i = (⋂ i, (s i)ᶜ)ᶜ := by
simp only [compl_iInter, compl_compl]
#align set.Union_eq_compl_Inter_compl Set.iUnion_eq_compl_iInter_compl
-- classical -- complete_boolean_algebra
theorem iInter_eq_compl_iUnion_compl (s : ι → Set β) : ⋂ i, s i = (⋃ i, (s i)ᶜ)ᶜ := by
simp only [compl_iUnion, compl_compl]
#align set.Inter_eq_compl_Union_compl Set.iInter_eq_compl_iUnion_compl
theorem inter_iUnion (s : Set β) (t : ι → Set β) : (s ∩ ⋃ i, t i) = ⋃ i, s ∩ t i :=
inf_iSup_eq _ _
#align set.inter_Union Set.inter_iUnion
theorem iUnion_inter (s : Set β) (t : ι → Set β) : (⋃ i, t i) ∩ s = ⋃ i, t i ∩ s :=
iSup_inf_eq _ _
#align set.Union_inter Set.iUnion_inter
theorem iUnion_union_distrib (s : ι → Set β) (t : ι → Set β) :
⋃ i, s i ∪ t i = (⋃ i, s i) ∪ ⋃ i, t i :=
iSup_sup_eq
#align set.Union_union_distrib Set.iUnion_union_distrib
theorem iInter_inter_distrib (s : ι → Set β) (t : ι → Set β) :
⋂ i, s i ∩ t i = (⋂ i, s i) ∩ ⋂ i, t i :=
iInf_inf_eq
#align set.Inter_inter_distrib Set.iInter_inter_distrib
theorem union_iUnion [Nonempty ι] (s : Set β) (t : ι → Set β) : (s ∪ ⋃ i, t i) = ⋃ i, s ∪ t i :=
sup_iSup
#align set.union_Union Set.union_iUnion
theorem iUnion_union [Nonempty ι] (s : Set β) (t : ι → Set β) : (⋃ i, t i) ∪ s = ⋃ i, t i ∪ s :=
iSup_sup
#align set.Union_union Set.iUnion_union
theorem inter_iInter [Nonempty ι] (s : Set β) (t : ι → Set β) : (s ∩ ⋂ i, t i) = ⋂ i, s ∩ t i :=
inf_iInf
#align set.inter_Inter Set.inter_iInter
theorem iInter_inter [Nonempty ι] (s : Set β) (t : ι → Set β) : (⋂ i, t i) ∩ s = ⋂ i, t i ∩ s :=
iInf_inf
#align set.Inter_inter Set.iInter_inter
-- classical
theorem union_iInter (s : Set β) (t : ι → Set β) : (s ∪ ⋂ i, t i) = ⋂ i, s ∪ t i :=
sup_iInf_eq _ _
#align set.union_Inter Set.union_iInter
theorem iInter_union (s : ι → Set β) (t : Set β) : (⋂ i, s i) ∪ t = ⋂ i, s i ∪ t :=
iInf_sup_eq _ _
#align set.Inter_union Set.iInter_union
theorem iUnion_diff (s : Set β) (t : ι → Set β) : (⋃ i, t i) \ s = ⋃ i, t i \ s :=
iUnion_inter _ _
#align set.Union_diff Set.iUnion_diff
theorem diff_iUnion [Nonempty ι] (s : Set β) (t : ι → Set β) : (s \ ⋃ i, t i) = ⋂ i, s \ t i := by
rw [diff_eq, compl_iUnion, inter_iInter]; rfl
#align set.diff_Union Set.diff_iUnion
theorem diff_iInter (s : Set β) (t : ι → Set β) : (s \ ⋂ i, t i) = ⋃ i, s \ t i := by
rw [diff_eq, compl_iInter, inter_iUnion]; rfl
#align set.diff_Inter Set.diff_iInter
theorem iUnion_inter_subset {ι α} {s t : ι → Set α} : ⋃ i, s i ∩ t i ⊆ (⋃ i, s i) ∩ ⋃ i, t i :=
le_iSup_inf_iSup s t
#align set.Union_inter_subset Set.iUnion_inter_subset
theorem iUnion_inter_of_monotone {ι α} [Preorder ι] [IsDirected ι (· ≤ ·)] {s t : ι → Set α}
(hs : Monotone s) (ht : Monotone t) : ⋃ i, s i ∩ t i = (⋃ i, s i) ∩ ⋃ i, t i :=
iSup_inf_of_monotone hs ht
#align set.Union_inter_of_monotone Set.iUnion_inter_of_monotone
theorem iUnion_inter_of_antitone {ι α} [Preorder ι] [IsDirected ι (swap (· ≤ ·))] {s t : ι → Set α}
(hs : Antitone s) (ht : Antitone t) : ⋃ i, s i ∩ t i = (⋃ i, s i) ∩ ⋃ i, t i :=
iSup_inf_of_antitone hs ht
#align set.Union_inter_of_antitone Set.iUnion_inter_of_antitone
theorem iInter_union_of_monotone {ι α} [Preorder ι] [IsDirected ι (swap (· ≤ ·))] {s t : ι → Set α}
(hs : Monotone s) (ht : Monotone t) : ⋂ i, s i ∪ t i = (⋂ i, s i) ∪ ⋂ i, t i :=
iInf_sup_of_monotone hs ht
#align set.Inter_union_of_monotone Set.iInter_union_of_monotone
theorem iInter_union_of_antitone {ι α} [Preorder ι] [IsDirected ι (· ≤ ·)] {s t : ι → Set α}
(hs : Antitone s) (ht : Antitone t) : ⋂ i, s i ∪ t i = (⋂ i, s i) ∪ ⋂ i, t i :=
iInf_sup_of_antitone hs ht
#align set.Inter_union_of_antitone Set.iInter_union_of_antitone
theorem iUnion_iInter_subset {s : ι → ι' → Set α} : (⋃ j, ⋂ i, s i j) ⊆ ⋂ i, ⋃ j, s i j :=
iSup_iInf_le_iInf_iSup (flip s)
#align set.Union_Inter_subset Set.iUnion_iInter_subset
theorem iUnion_option {ι} (s : Option ι → Set α) : ⋃ o, s o = s none ∪ ⋃ i, s (some i) :=
iSup_option s
#align set.Union_option Set.iUnion_option
theorem iInter_option {ι} (s : Option ι → Set α) : ⋂ o, s o = s none ∩ ⋂ i, s (some i) :=
iInf_option s
#align set.Inter_option Set.iInter_option
section
variable (p : ι → Prop) [DecidablePred p]
theorem iUnion_dite (f : ∀ i, p i → Set α) (g : ∀ i, ¬p i → Set α) :
⋃ i, (if h : p i then f i h else g i h) = (⋃ (i) (h : p i), f i h) ∪ ⋃ (i) (h : ¬p i), g i h :=
iSup_dite _ _ _
#align set.Union_dite Set.iUnion_dite
theorem iUnion_ite (f g : ι → Set α) :
⋃ i, (if p i then f i else g i) = (⋃ (i) (_ : p i), f i) ∪ ⋃ (i) (_ : ¬p i), g i :=
iUnion_dite _ _ _
#align set.Union_ite Set.iUnion_ite
theorem iInter_dite (f : ∀ i, p i → Set α) (g : ∀ i, ¬p i → Set α) :
⋂ i, (if h : p i then f i h else g i h) = (⋂ (i) (h : p i), f i h) ∩ ⋂ (i) (h : ¬p i), g i h :=
iInf_dite _ _ _
#align set.Inter_dite Set.iInter_dite
theorem iInter_ite (f g : ι → Set α) :
⋂ i, (if p i then f i else g i) = (⋂ (i) (_ : p i), f i) ∩ ⋂ (i) (_ : ¬p i), g i :=
iInter_dite _ _ _
#align set.Inter_ite Set.iInter_ite
end
| Mathlib/Data/Set/Lattice.lean | 600 | 611 | theorem image_projection_prod {ι : Type*} {α : ι → Type*} {v : ∀ i : ι, Set (α i)}
(hv : (pi univ v).Nonempty) (i : ι) :
((fun x : ∀ i : ι, α i => x i) '' ⋂ k, (fun x : ∀ j : ι, α j => x k) ⁻¹' v k) = v i := by |
classical
apply Subset.antisymm
· simp [iInter_subset]
· intro y y_in
simp only [mem_image, mem_iInter, mem_preimage]
rcases hv with ⟨z, hz⟩
refine ⟨Function.update z i y, ?_, update_same i y z⟩
rw [@forall_update_iff ι α _ z i y fun i t => t ∈ v i]
exact ⟨y_in, fun j _ => by simpa using hz j⟩
|
import Mathlib.Algebra.Field.Opposite
import Mathlib.Algebra.Group.Subgroup.ZPowers
import Mathlib.Algebra.Group.Submonoid.Membership
import Mathlib.Algebra.Ring.NegOnePow
import Mathlib.Algebra.Order.Archimedean
import Mathlib.GroupTheory.Coset
#align_import algebra.periodic from "leanprover-community/mathlib"@"30413fc89f202a090a54d78e540963ed3de0056e"
variable {α β γ : Type*} {f g : α → β} {c c₁ c₂ x : α}
open Set
namespace Function
@[simp]
def Periodic [Add α] (f : α → β) (c : α) : Prop :=
∀ x : α, f (x + c) = f x
#align function.periodic Function.Periodic
protected theorem Periodic.funext [Add α] (h : Periodic f c) : (fun x => f (x + c)) = f :=
funext h
#align function.periodic.funext Function.Periodic.funext
protected theorem Periodic.comp [Add α] (h : Periodic f c) (g : β → γ) : Periodic (g ∘ f) c := by
simp_all
#align function.periodic.comp Function.Periodic.comp
theorem Periodic.comp_addHom [Add α] [Add γ] (h : Periodic f c) (g : AddHom γ α) (g_inv : α → γ)
(hg : RightInverse g_inv g) : Periodic (f ∘ g) (g_inv c) := fun x => by
simp only [hg c, h (g x), map_add, comp_apply]
#align function.periodic.comp_add_hom Function.Periodic.comp_addHom
@[to_additive]
protected theorem Periodic.mul [Add α] [Mul β] (hf : Periodic f c) (hg : Periodic g c) :
Periodic (f * g) c := by simp_all
#align function.periodic.mul Function.Periodic.mul
#align function.periodic.add Function.Periodic.add
@[to_additive]
protected theorem Periodic.div [Add α] [Div β] (hf : Periodic f c) (hg : Periodic g c) :
Periodic (f / g) c := by simp_all
#align function.periodic.div Function.Periodic.div
#align function.periodic.sub Function.Periodic.sub
@[to_additive]
theorem _root_.List.periodic_prod [Add α] [Monoid β] (l : List (α → β))
(hl : ∀ f ∈ l, Periodic f c) : Periodic l.prod c := by
induction' l with g l ih hl
· simp
· rw [List.forall_mem_cons] at hl
simpa only [List.prod_cons] using hl.1.mul (ih hl.2)
#align list.periodic_prod List.periodic_prod
#align list.periodic_sum List.periodic_sum
@[to_additive]
theorem _root_.Multiset.periodic_prod [Add α] [CommMonoid β] (s : Multiset (α → β))
(hs : ∀ f ∈ s, Periodic f c) : Periodic s.prod c :=
(s.prod_toList ▸ s.toList.periodic_prod) fun f hf => hs f <| Multiset.mem_toList.mp hf
#align multiset.periodic_prod Multiset.periodic_prod
#align multiset.periodic_sum Multiset.periodic_sum
@[to_additive]
theorem _root_.Finset.periodic_prod [Add α] [CommMonoid β] {ι : Type*} {f : ι → α → β}
(s : Finset ι) (hs : ∀ i ∈ s, Periodic (f i) c) : Periodic (∏ i ∈ s, f i) c :=
s.prod_to_list f ▸ (s.toList.map f).periodic_prod (by simpa [-Periodic] )
#align finset.periodic_prod Finset.periodic_prod
#align finset.periodic_sum Finset.periodic_sum
@[to_additive]
protected theorem Periodic.smul [Add α] [SMul γ β] (h : Periodic f c) (a : γ) :
Periodic (a • f) c := by simp_all
#align function.periodic.smul Function.Periodic.smul
#align function.periodic.vadd Function.Periodic.vadd
protected theorem Periodic.const_smul [AddMonoid α] [Group γ] [DistribMulAction γ α]
(h : Periodic f c) (a : γ) : Periodic (fun x => f (a • x)) (a⁻¹ • c) := fun x => by
simpa only [smul_add, smul_inv_smul] using h (a • x)
#align function.periodic.const_smul Function.Periodic.const_smul
protected theorem Periodic.const_smul₀ [AddCommMonoid α] [DivisionSemiring γ] [Module γ α]
(h : Periodic f c) (a : γ) : Periodic (fun x => f (a • x)) (a⁻¹ • c) := fun x => by
by_cases ha : a = 0
· simp only [ha, zero_smul]
· simpa only [smul_add, smul_inv_smul₀ ha] using h (a • x)
#align function.periodic.const_smul₀ Function.Periodic.const_smul₀
protected theorem Periodic.const_mul [DivisionSemiring α] (h : Periodic f c) (a : α) :
Periodic (fun x => f (a * x)) (a⁻¹ * c) :=
Periodic.const_smul₀ h a
#align function.periodic.const_mul Function.Periodic.const_mul
theorem Periodic.const_inv_smul [AddMonoid α] [Group γ] [DistribMulAction γ α] (h : Periodic f c)
(a : γ) : Periodic (fun x => f (a⁻¹ • x)) (a • c) := by
simpa only [inv_inv] using h.const_smul a⁻¹
#align function.periodic.const_inv_smul Function.Periodic.const_inv_smul
theorem Periodic.const_inv_smul₀ [AddCommMonoid α] [DivisionSemiring γ] [Module γ α]
(h : Periodic f c) (a : γ) : Periodic (fun x => f (a⁻¹ • x)) (a • c) := by
simpa only [inv_inv] using h.const_smul₀ a⁻¹
#align function.periodic.const_inv_smul₀ Function.Periodic.const_inv_smul₀
theorem Periodic.const_inv_mul [DivisionSemiring α] (h : Periodic f c) (a : α) :
Periodic (fun x => f (a⁻¹ * x)) (a * c) :=
h.const_inv_smul₀ a
#align function.periodic.const_inv_mul Function.Periodic.const_inv_mul
theorem Periodic.mul_const [DivisionSemiring α] (h : Periodic f c) (a : α) :
Periodic (fun x => f (x * a)) (c * a⁻¹) :=
h.const_smul₀ (MulOpposite.op a)
#align function.periodic.mul_const Function.Periodic.mul_const
theorem Periodic.mul_const' [DivisionSemiring α] (h : Periodic f c) (a : α) :
Periodic (fun x => f (x * a)) (c / a) := by simpa only [div_eq_mul_inv] using h.mul_const a
#align function.periodic.mul_const' Function.Periodic.mul_const'
theorem Periodic.mul_const_inv [DivisionSemiring α] (h : Periodic f c) (a : α) :
Periodic (fun x => f (x * a⁻¹)) (c * a) :=
h.const_inv_smul₀ (MulOpposite.op a)
#align function.periodic.mul_const_inv Function.Periodic.mul_const_inv
theorem Periodic.div_const [DivisionSemiring α] (h : Periodic f c) (a : α) :
Periodic (fun x => f (x / a)) (c * a) := by simpa only [div_eq_mul_inv] using h.mul_const_inv a
#align function.periodic.div_const Function.Periodic.div_const
theorem Periodic.add_period [AddSemigroup α] (h1 : Periodic f c₁) (h2 : Periodic f c₂) :
Periodic f (c₁ + c₂) := by simp_all [← add_assoc]
#align function.periodic.add_period Function.Periodic.add_period
theorem Periodic.sub_eq [AddGroup α] (h : Periodic f c) (x : α) : f (x - c) = f x := by
simpa only [sub_add_cancel] using (h (x - c)).symm
#align function.periodic.sub_eq Function.Periodic.sub_eq
theorem Periodic.sub_eq' [AddCommGroup α] (h : Periodic f c) : f (c - x) = f (-x) := by
simpa only [sub_eq_neg_add] using h (-x)
#align function.periodic.sub_eq' Function.Periodic.sub_eq'
protected theorem Periodic.neg [AddGroup α] (h : Periodic f c) : Periodic f (-c) := by
simpa only [sub_eq_add_neg, Periodic] using h.sub_eq
#align function.periodic.neg Function.Periodic.neg
theorem Periodic.sub_period [AddGroup α] (h1 : Periodic f c₁) (h2 : Periodic f c₂) :
Periodic f (c₁ - c₂) := fun x => by
rw [sub_eq_add_neg, ← add_assoc, h2.neg, h1]
#align function.periodic.sub_period Function.Periodic.sub_period
theorem Periodic.const_add [AddSemigroup α] (h : Periodic f c) (a : α) :
Periodic (fun x => f (a + x)) c := fun x => by simpa [add_assoc] using h (a + x)
#align function.periodic.const_add Function.Periodic.const_add
theorem Periodic.add_const [AddCommSemigroup α] (h : Periodic f c) (a : α) :
Periodic (fun x => f (x + a)) c := fun x => by
simpa only [add_right_comm] using h (x + a)
#align function.periodic.add_const Function.Periodic.add_const
theorem Periodic.const_sub [AddCommGroup α] (h : Periodic f c) (a : α) :
Periodic (fun x => f (a - x)) c := fun x => by
simp only [← sub_sub, h.sub_eq]
#align function.periodic.const_sub Function.Periodic.const_sub
theorem Periodic.sub_const [AddCommGroup α] (h : Periodic f c) (a : α) :
Periodic (fun x => f (x - a)) c := by
simpa only [sub_eq_add_neg] using h.add_const (-a)
#align function.periodic.sub_const Function.Periodic.sub_const
theorem Periodic.nsmul [AddMonoid α] (h : Periodic f c) (n : ℕ) : Periodic f (n • c) := by
induction n <;> simp_all [Nat.succ_eq_add_one, add_nsmul, ← add_assoc, zero_nsmul]
#align function.periodic.nsmul Function.Periodic.nsmul
theorem Periodic.nat_mul [Semiring α] (h : Periodic f c) (n : ℕ) : Periodic f (n * c) := by
simpa only [nsmul_eq_mul] using h.nsmul n
#align function.periodic.nat_mul Function.Periodic.nat_mul
theorem Periodic.neg_nsmul [AddGroup α] (h : Periodic f c) (n : ℕ) : Periodic f (-(n • c)) :=
(h.nsmul n).neg
#align function.periodic.neg_nsmul Function.Periodic.neg_nsmul
theorem Periodic.neg_nat_mul [Ring α] (h : Periodic f c) (n : ℕ) : Periodic f (-(n * c)) :=
(h.nat_mul n).neg
#align function.periodic.neg_nat_mul Function.Periodic.neg_nat_mul
theorem Periodic.sub_nsmul_eq [AddGroup α] (h : Periodic f c) (n : ℕ) : f (x - n • c) = f x := by
simpa only [sub_eq_add_neg] using h.neg_nsmul n x
#align function.periodic.sub_nsmul_eq Function.Periodic.sub_nsmul_eq
theorem Periodic.sub_nat_mul_eq [Ring α] (h : Periodic f c) (n : ℕ) : f (x - n * c) = f x := by
simpa only [nsmul_eq_mul] using h.sub_nsmul_eq n
#align function.periodic.sub_nat_mul_eq Function.Periodic.sub_nat_mul_eq
theorem Periodic.nsmul_sub_eq [AddCommGroup α] (h : Periodic f c) (n : ℕ) :
f (n • c - x) = f (-x) :=
(h.nsmul n).sub_eq'
#align function.periodic.nsmul_sub_eq Function.Periodic.nsmul_sub_eq
theorem Periodic.nat_mul_sub_eq [Ring α] (h : Periodic f c) (n : ℕ) : f (n * c - x) = f (-x) := by
simpa only [sub_eq_neg_add] using h.nat_mul n (-x)
#align function.periodic.nat_mul_sub_eq Function.Periodic.nat_mul_sub_eq
protected theorem Periodic.zsmul [AddGroup α] (h : Periodic f c) (n : ℤ) : Periodic f (n • c) := by
cases' n with n n
· simpa only [Int.ofNat_eq_coe, natCast_zsmul] using h.nsmul n
· simpa only [negSucc_zsmul] using (h.nsmul (n + 1)).neg
#align function.periodic.zsmul Function.Periodic.zsmul
protected theorem Periodic.int_mul [Ring α] (h : Periodic f c) (n : ℤ) : Periodic f (n * c) := by
simpa only [zsmul_eq_mul] using h.zsmul n
#align function.periodic.int_mul Function.Periodic.int_mul
theorem Periodic.sub_zsmul_eq [AddGroup α] (h : Periodic f c) (n : ℤ) : f (x - n • c) = f x :=
(h.zsmul n).sub_eq x
#align function.periodic.sub_zsmul_eq Function.Periodic.sub_zsmul_eq
theorem Periodic.sub_int_mul_eq [Ring α] (h : Periodic f c) (n : ℤ) : f (x - n * c) = f x :=
(h.int_mul n).sub_eq x
#align function.periodic.sub_int_mul_eq Function.Periodic.sub_int_mul_eq
theorem Periodic.zsmul_sub_eq [AddCommGroup α] (h : Periodic f c) (n : ℤ) :
f (n • c - x) = f (-x) :=
(h.zsmul _).sub_eq'
#align function.periodic.zsmul_sub_eq Function.Periodic.zsmul_sub_eq
theorem Periodic.int_mul_sub_eq [Ring α] (h : Periodic f c) (n : ℤ) : f (n * c - x) = f (-x) :=
(h.int_mul _).sub_eq'
#align function.periodic.int_mul_sub_eq Function.Periodic.int_mul_sub_eq
protected theorem Periodic.eq [AddZeroClass α] (h : Periodic f c) : f c = f 0 := by
simpa only [zero_add] using h 0
#align function.periodic.eq Function.Periodic.eq
protected theorem Periodic.neg_eq [AddGroup α] (h : Periodic f c) : f (-c) = f 0 :=
h.neg.eq
#align function.periodic.neg_eq Function.Periodic.neg_eq
protected theorem Periodic.nsmul_eq [AddMonoid α] (h : Periodic f c) (n : ℕ) : f (n • c) = f 0 :=
(h.nsmul n).eq
#align function.periodic.nsmul_eq Function.Periodic.nsmul_eq
theorem Periodic.nat_mul_eq [Semiring α] (h : Periodic f c) (n : ℕ) : f (n * c) = f 0 :=
(h.nat_mul n).eq
#align function.periodic.nat_mul_eq Function.Periodic.nat_mul_eq
theorem Periodic.zsmul_eq [AddGroup α] (h : Periodic f c) (n : ℤ) : f (n • c) = f 0 :=
(h.zsmul n).eq
#align function.periodic.zsmul_eq Function.Periodic.zsmul_eq
theorem Periodic.int_mul_eq [Ring α] (h : Periodic f c) (n : ℤ) : f (n * c) = f 0 :=
(h.int_mul n).eq
#align function.periodic.int_mul_eq Function.Periodic.int_mul_eq
theorem Periodic.exists_mem_Ico₀ [LinearOrderedAddCommGroup α] [Archimedean α] (h : Periodic f c)
(hc : 0 < c) (x) : ∃ y ∈ Ico 0 c, f x = f y :=
let ⟨n, H, _⟩ := existsUnique_zsmul_near_of_pos' hc x
⟨x - n • c, H, (h.sub_zsmul_eq n).symm⟩
#align function.periodic.exists_mem_Ico₀ Function.Periodic.exists_mem_Ico₀
theorem Periodic.exists_mem_Ico [LinearOrderedAddCommGroup α] [Archimedean α] (h : Periodic f c)
(hc : 0 < c) (x a) : ∃ y ∈ Ico a (a + c), f x = f y :=
let ⟨n, H, _⟩ := existsUnique_add_zsmul_mem_Ico hc x a
⟨x + n • c, H, (h.zsmul n x).symm⟩
#align function.periodic.exists_mem_Ico Function.Periodic.exists_mem_Ico
theorem Periodic.exists_mem_Ioc [LinearOrderedAddCommGroup α] [Archimedean α] (h : Periodic f c)
(hc : 0 < c) (x a) : ∃ y ∈ Ioc a (a + c), f x = f y :=
let ⟨n, H, _⟩ := existsUnique_add_zsmul_mem_Ioc hc x a
⟨x + n • c, H, (h.zsmul n x).symm⟩
#align function.periodic.exists_mem_Ioc Function.Periodic.exists_mem_Ioc
theorem Periodic.image_Ioc [LinearOrderedAddCommGroup α] [Archimedean α] (h : Periodic f c)
(hc : 0 < c) (a : α) : f '' Ioc a (a + c) = range f :=
(image_subset_range _ _).antisymm <| range_subset_iff.2 fun x =>
let ⟨y, hy, hyx⟩ := h.exists_mem_Ioc hc x a
⟨y, hy, hyx.symm⟩
#align function.periodic.image_Ioc Function.Periodic.image_Ioc
theorem Periodic.image_Icc [LinearOrderedAddCommGroup α] [Archimedean α] (h : Periodic f c)
(hc : 0 < c) (a : α) : f '' Icc a (a + c) = range f :=
(image_subset_range _ _).antisymm <| h.image_Ioc hc a ▸ image_subset _ Ioc_subset_Icc_self
theorem Periodic.image_uIcc [LinearOrderedAddCommGroup α] [Archimedean α] (h : Periodic f c)
(hc : c ≠ 0) (a : α) : f '' uIcc a (a + c) = range f := by
cases hc.lt_or_lt with
| inl hc =>
rw [uIcc_of_ge (add_le_of_nonpos_right hc.le), ← h.neg.image_Icc (neg_pos.2 hc) (a + c),
add_neg_cancel_right]
| inr hc => rw [uIcc_of_le (le_add_of_nonneg_right hc.le), h.image_Icc hc]
theorem periodic_with_period_zero [AddZeroClass α] (f : α → β) : Periodic f 0 := fun x => by
rw [add_zero]
#align function.periodic_with_period_zero Function.periodic_with_period_zero
theorem Periodic.map_vadd_zmultiples [AddCommGroup α] (hf : Periodic f c)
(a : AddSubgroup.zmultiples c) (x : α) : f (a +ᵥ x) = f x := by
rcases a with ⟨_, m, rfl⟩
simp [AddSubgroup.vadd_def, add_comm _ x, hf.zsmul m x]
#align function.periodic.map_vadd_zmultiples Function.Periodic.map_vadd_zmultiples
theorem Periodic.map_vadd_multiples [AddCommMonoid α] (hf : Periodic f c)
(a : AddSubmonoid.multiples c) (x : α) : f (a +ᵥ x) = f x := by
rcases a with ⟨_, m, rfl⟩
simp [AddSubmonoid.vadd_def, add_comm _ x, hf.nsmul m x]
#align function.periodic.map_vadd_multiples Function.Periodic.map_vadd_multiples
def Periodic.lift [AddGroup α] (h : Periodic f c) (x : α ⧸ AddSubgroup.zmultiples c) : β :=
Quotient.liftOn' x f fun a b h' => by
rw [QuotientAddGroup.leftRel_apply] at h'
obtain ⟨k, hk⟩ := h'
exact (h.zsmul k _).symm.trans (congr_arg f (add_eq_of_eq_neg_add hk))
#align function.periodic.lift Function.Periodic.lift
@[simp]
theorem Periodic.lift_coe [AddGroup α] (h : Periodic f c) (a : α) :
h.lift (a : α ⧸ AddSubgroup.zmultiples c) = f a :=
rfl
#align function.periodic.lift_coe Function.Periodic.lift_coe
lemma Periodic.not_injective {R X : Type*} [AddZeroClass R] {f : R → X} {c : R}
(hf : Periodic f c) (hc : c ≠ 0) : ¬ Injective f := fun h ↦ hc <| h hf.eq
@[simp]
def Antiperiodic [Add α] [Neg β] (f : α → β) (c : α) : Prop :=
∀ x : α, f (x + c) = -f x
#align function.antiperiodic Function.Antiperiodic
protected theorem Antiperiodic.funext [Add α] [Neg β] (h : Antiperiodic f c) :
(fun x => f (x + c)) = -f :=
funext h
#align function.antiperiodic.funext Function.Antiperiodic.funext
protected theorem Antiperiodic.funext' [Add α] [InvolutiveNeg β] (h : Antiperiodic f c) :
(fun x => -f (x + c)) = f :=
neg_eq_iff_eq_neg.mpr h.funext
#align function.antiperiodic.funext' Function.Antiperiodic.funext'
protected theorem Antiperiodic.periodic [AddMonoid α] [InvolutiveNeg β]
(h : Antiperiodic f c) : Periodic f (2 • c) := by simp [two_nsmul, ← add_assoc, h _]
protected theorem Antiperiodic.periodic_two_mul [Semiring α] [InvolutiveNeg β]
(h : Antiperiodic f c) : Periodic f (2 * c) := nsmul_eq_mul 2 c ▸ h.periodic
#align function.antiperiodic.periodic Function.Antiperiodic.periodic_two_mul
protected theorem Antiperiodic.eq [AddZeroClass α] [Neg β] (h : Antiperiodic f c) : f c = -f 0 := by
simpa only [zero_add] using h 0
#align function.antiperiodic.eq Function.Antiperiodic.eq
theorem Antiperiodic.even_nsmul_periodic [AddMonoid α] [InvolutiveNeg β] (h : Antiperiodic f c)
(n : ℕ) : Periodic f ((2 * n) • c) := mul_nsmul c 2 n ▸ h.periodic.nsmul n
theorem Antiperiodic.nat_even_mul_periodic [Semiring α] [InvolutiveNeg β] (h : Antiperiodic f c)
(n : ℕ) : Periodic f (n * (2 * c)) :=
h.periodic_two_mul.nat_mul n
#align function.antiperiodic.nat_even_mul_periodic Function.Antiperiodic.nat_even_mul_periodic
theorem Antiperiodic.odd_nsmul_antiperiodic [AddMonoid α] [InvolutiveNeg β] (h : Antiperiodic f c)
(n : ℕ) : Antiperiodic f ((2 * n + 1) • c) := fun x => by
rw [add_nsmul, one_nsmul, ← add_assoc, h, h.even_nsmul_periodic]
theorem Antiperiodic.nat_odd_mul_antiperiodic [Semiring α] [InvolutiveNeg β] (h : Antiperiodic f c)
(n : ℕ) : Antiperiodic f (n * (2 * c) + c) := fun x => by
rw [← add_assoc, h, h.nat_even_mul_periodic]
#align function.antiperiodic.nat_odd_mul_antiperiodic Function.Antiperiodic.nat_odd_mul_antiperiodic
theorem Antiperiodic.even_zsmul_periodic [AddGroup α] [InvolutiveNeg β] (h : Antiperiodic f c)
(n : ℤ) : Periodic f ((2 * n) • c) := by
rw [mul_comm, mul_zsmul, two_zsmul, ← two_nsmul]
exact h.periodic.zsmul n
theorem Antiperiodic.int_even_mul_periodic [Ring α] [InvolutiveNeg β] (h : Antiperiodic f c)
(n : ℤ) : Periodic f (n * (2 * c)) :=
h.periodic_two_mul.int_mul n
#align function.antiperiodic.int_even_mul_periodic Function.Antiperiodic.int_even_mul_periodic
| Mathlib/Algebra/Periodic.lean | 419 | 422 | theorem Antiperiodic.odd_zsmul_antiperiodic [AddGroup α] [InvolutiveNeg β] (h : Antiperiodic f c)
(n : ℤ) : Antiperiodic f ((2 * n + 1) • c) := by |
intro x
rw [add_zsmul, one_zsmul, ← add_assoc, h, h.even_zsmul_periodic]
|
import Mathlib.Algebra.Algebra.Defs
import Mathlib.Algebra.Order.Group.Basic
import Mathlib.Algebra.Order.Ring.Basic
import Mathlib.RingTheory.Localization.Basic
import Mathlib.SetTheory.Game.Birthday
import Mathlib.SetTheory.Surreal.Basic
#align_import set_theory.surreal.dyadic from "leanprover-community/mathlib"@"92ca63f0fb391a9ca5f22d2409a6080e786d99f7"
universe u
namespace SetTheory
namespace PGame
def powHalf : ℕ → PGame
| 0 => 1
| n + 1 => ⟨PUnit, PUnit, 0, fun _ => powHalf n⟩
#align pgame.pow_half SetTheory.PGame.powHalf
@[simp]
theorem powHalf_zero : powHalf 0 = 1 :=
rfl
#align pgame.pow_half_zero SetTheory.PGame.powHalf_zero
theorem powHalf_leftMoves (n) : (powHalf n).LeftMoves = PUnit := by cases n <;> rfl
#align pgame.pow_half_left_moves SetTheory.PGame.powHalf_leftMoves
theorem powHalf_zero_rightMoves : (powHalf 0).RightMoves = PEmpty :=
rfl
#align pgame.pow_half_zero_right_moves SetTheory.PGame.powHalf_zero_rightMoves
theorem powHalf_succ_rightMoves (n) : (powHalf (n + 1)).RightMoves = PUnit :=
rfl
#align pgame.pow_half_succ_right_moves SetTheory.PGame.powHalf_succ_rightMoves
@[simp]
theorem powHalf_moveLeft (n i) : (powHalf n).moveLeft i = 0 := by cases n <;> cases i <;> rfl
#align pgame.pow_half_move_left SetTheory.PGame.powHalf_moveLeft
@[simp]
theorem powHalf_succ_moveRight (n i) : (powHalf (n + 1)).moveRight i = powHalf n :=
rfl
#align pgame.pow_half_succ_move_right SetTheory.PGame.powHalf_succ_moveRight
instance uniquePowHalfLeftMoves (n) : Unique (powHalf n).LeftMoves := by
cases n <;> exact PUnit.unique
#align pgame.unique_pow_half_left_moves SetTheory.PGame.uniquePowHalfLeftMoves
instance isEmpty_powHalf_zero_rightMoves : IsEmpty (powHalf 0).RightMoves :=
inferInstanceAs (IsEmpty PEmpty)
#align pgame.is_empty_pow_half_zero_right_moves SetTheory.PGame.isEmpty_powHalf_zero_rightMoves
instance uniquePowHalfSuccRightMoves (n) : Unique (powHalf (n + 1)).RightMoves :=
PUnit.unique
#align pgame.unique_pow_half_succ_right_moves SetTheory.PGame.uniquePowHalfSuccRightMoves
@[simp]
theorem birthday_half : birthday (powHalf 1) = 2 := by
rw [birthday_def]; simp
#align pgame.birthday_half SetTheory.PGame.birthday_half
theorem numeric_powHalf (n) : (powHalf n).Numeric := by
induction' n with n hn
· exact numeric_one
· constructor
· simpa using hn.moveLeft_lt default
· exact ⟨fun _ => numeric_zero, fun _ => hn⟩
#align pgame.numeric_pow_half SetTheory.PGame.numeric_powHalf
theorem powHalf_succ_lt_powHalf (n : ℕ) : powHalf (n + 1) < powHalf n :=
(numeric_powHalf (n + 1)).lt_moveRight default
#align pgame.pow_half_succ_lt_pow_half SetTheory.PGame.powHalf_succ_lt_powHalf
theorem powHalf_succ_le_powHalf (n : ℕ) : powHalf (n + 1) ≤ powHalf n :=
(powHalf_succ_lt_powHalf n).le
#align pgame.pow_half_succ_le_pow_half SetTheory.PGame.powHalf_succ_le_powHalf
theorem powHalf_le_one (n : ℕ) : powHalf n ≤ 1 := by
induction' n with n hn
· exact le_rfl
· exact (powHalf_succ_le_powHalf n).trans hn
#align pgame.pow_half_le_one SetTheory.PGame.powHalf_le_one
theorem powHalf_succ_lt_one (n : ℕ) : powHalf (n + 1) < 1 :=
(powHalf_succ_lt_powHalf n).trans_le <| powHalf_le_one n
#align pgame.pow_half_succ_lt_one SetTheory.PGame.powHalf_succ_lt_one
theorem powHalf_pos (n : ℕ) : 0 < powHalf n := by
rw [← lf_iff_lt numeric_zero (numeric_powHalf n), zero_lf_le]; simp
#align pgame.pow_half_pos SetTheory.PGame.powHalf_pos
theorem zero_le_powHalf (n : ℕ) : 0 ≤ powHalf n :=
(powHalf_pos n).le
#align pgame.zero_le_pow_half SetTheory.PGame.zero_le_powHalf
| Mathlib/SetTheory/Surreal/Dyadic.lean | 124 | 156 | theorem add_powHalf_succ_self_eq_powHalf (n) : powHalf (n + 1) + powHalf (n + 1) ≈ powHalf n := by |
induction' n using Nat.strong_induction_on with n hn
constructor <;> rw [le_iff_forall_lf] <;> constructor
· rintro (⟨⟨⟩⟩ | ⟨⟨⟩⟩) <;> apply lf_of_lt
· calc
0 + powHalf n.succ ≈ powHalf n.succ := zero_add_equiv _
_ < powHalf n := powHalf_succ_lt_powHalf n
· calc
powHalf n.succ + 0 ≈ powHalf n.succ := add_zero_equiv _
_ < powHalf n := powHalf_succ_lt_powHalf n
· cases' n with n
· rintro ⟨⟩
rintro ⟨⟩
apply lf_of_moveRight_le
swap
· exact Sum.inl default
calc
powHalf n.succ + powHalf (n.succ + 1) ≤ powHalf n.succ + powHalf n.succ :=
add_le_add_left (powHalf_succ_le_powHalf _) _
_ ≈ powHalf n := hn _ (Nat.lt_succ_self n)
· simp only [powHalf_moveLeft, forall_const]
apply lf_of_lt
calc
0 ≈ 0 + 0 := Equiv.symm (add_zero_equiv 0)
_ ≤ powHalf n.succ + 0 := add_le_add_right (zero_le_powHalf _) _
_ < powHalf n.succ + powHalf n.succ := add_lt_add_left (powHalf_pos _) _
· rintro (⟨⟨⟩⟩ | ⟨⟨⟩⟩) <;> apply lf_of_lt
· calc
powHalf n ≈ powHalf n + 0 := Equiv.symm (add_zero_equiv _)
_ < powHalf n + powHalf n.succ := add_lt_add_left (powHalf_pos _) _
· calc
powHalf n ≈ 0 + powHalf n := Equiv.symm (zero_add_equiv _)
_ < powHalf n.succ + powHalf n := add_lt_add_right (powHalf_pos _) _
|
import Mathlib.Data.Set.Subsingleton
import Mathlib.Logic.Equiv.Defs
import Mathlib.Algebra.Group.Defs
#align_import data.part from "leanprover-community/mathlib"@"80c43012d26f63026d362c3aba28f3c3bafb07e6"
open Function
structure Part.{u} (α : Type u) : Type u where
Dom : Prop
get : Dom → α
#align part Part
namespace Part
variable {α : Type*} {β : Type*} {γ : Type*}
def toOption (o : Part α) [Decidable o.Dom] : Option α :=
if h : Dom o then some (o.get h) else none
#align part.to_option Part.toOption
@[simp] lemma toOption_isSome (o : Part α) [Decidable o.Dom] : o.toOption.isSome ↔ o.Dom := by
by_cases h : o.Dom <;> simp [h, toOption]
#align part.to_option_is_some Part.toOption_isSome
@[simp] lemma toOption_isNone (o : Part α) [Decidable o.Dom] : o.toOption.isNone ↔ ¬o.Dom := by
by_cases h : o.Dom <;> simp [h, toOption]
#align part.to_option_is_none Part.toOption_isNone
theorem ext' : ∀ {o p : Part α}, (o.Dom ↔ p.Dom) → (∀ h₁ h₂, o.get h₁ = p.get h₂) → o = p
| ⟨od, o⟩, ⟨pd, p⟩, H1, H2 => by
have t : od = pd := propext H1
cases t; rw [show o = p from funext fun p => H2 p p]
#align part.ext' Part.ext'
@[simp]
theorem eta : ∀ o : Part α, (⟨o.Dom, fun h => o.get h⟩ : Part α) = o
| ⟨_, _⟩ => rfl
#align part.eta Part.eta
protected def Mem (a : α) (o : Part α) : Prop :=
∃ h, o.get h = a
#align part.mem Part.Mem
instance : Membership α (Part α) :=
⟨Part.Mem⟩
theorem mem_eq (a : α) (o : Part α) : (a ∈ o) = ∃ h, o.get h = a :=
rfl
#align part.mem_eq Part.mem_eq
theorem dom_iff_mem : ∀ {o : Part α}, o.Dom ↔ ∃ y, y ∈ o
| ⟨_, f⟩ => ⟨fun h => ⟨f h, h, rfl⟩, fun ⟨_, h, rfl⟩ => h⟩
#align part.dom_iff_mem Part.dom_iff_mem
theorem get_mem {o : Part α} (h) : get o h ∈ o :=
⟨_, rfl⟩
#align part.get_mem Part.get_mem
@[simp]
theorem mem_mk_iff {p : Prop} {o : p → α} {a : α} : a ∈ Part.mk p o ↔ ∃ h, o h = a :=
Iff.rfl
#align part.mem_mk_iff Part.mem_mk_iff
@[ext]
theorem ext {o p : Part α} (H : ∀ a, a ∈ o ↔ a ∈ p) : o = p :=
(ext' ⟨fun h => ((H _).1 ⟨h, rfl⟩).fst, fun h => ((H _).2 ⟨h, rfl⟩).fst⟩) fun _ _ =>
((H _).2 ⟨_, rfl⟩).snd
#align part.ext Part.ext
def none : Part α :=
⟨False, False.rec⟩
#align part.none Part.none
instance : Inhabited (Part α) :=
⟨none⟩
@[simp]
theorem not_mem_none (a : α) : a ∉ @none α := fun h => h.fst
#align part.not_mem_none Part.not_mem_none
def some (a : α) : Part α :=
⟨True, fun _ => a⟩
#align part.some Part.some
@[simp]
theorem some_dom (a : α) : (some a).Dom :=
trivial
#align part.some_dom Part.some_dom
theorem mem_unique : ∀ {a b : α} {o : Part α}, a ∈ o → b ∈ o → a = b
| _, _, ⟨_, _⟩, ⟨_, rfl⟩, ⟨_, rfl⟩ => rfl
#align part.mem_unique Part.mem_unique
theorem Mem.left_unique : Relator.LeftUnique ((· ∈ ·) : α → Part α → Prop) := fun _ _ _ =>
mem_unique
#align part.mem.left_unique Part.Mem.left_unique
theorem get_eq_of_mem {o : Part α} {a} (h : a ∈ o) (h') : get o h' = a :=
mem_unique ⟨_, rfl⟩ h
#align part.get_eq_of_mem Part.get_eq_of_mem
protected theorem subsingleton (o : Part α) : Set.Subsingleton { a | a ∈ o } := fun _ ha _ hb =>
mem_unique ha hb
#align part.subsingleton Part.subsingleton
@[simp]
theorem get_some {a : α} (ha : (some a).Dom) : get (some a) ha = a :=
rfl
#align part.get_some Part.get_some
theorem mem_some (a : α) : a ∈ some a :=
⟨trivial, rfl⟩
#align part.mem_some Part.mem_some
@[simp]
theorem mem_some_iff {a b} : b ∈ (some a : Part α) ↔ b = a :=
⟨fun ⟨_, e⟩ => e.symm, fun e => ⟨trivial, e.symm⟩⟩
#align part.mem_some_iff Part.mem_some_iff
theorem eq_some_iff {a : α} {o : Part α} : o = some a ↔ a ∈ o :=
⟨fun e => e.symm ▸ mem_some _, fun ⟨h, e⟩ => e ▸ ext' (iff_true_intro h) fun _ _ => rfl⟩
#align part.eq_some_iff Part.eq_some_iff
theorem eq_none_iff {o : Part α} : o = none ↔ ∀ a, a ∉ o :=
⟨fun e => e.symm ▸ not_mem_none, fun h => ext (by simpa)⟩
#align part.eq_none_iff Part.eq_none_iff
theorem eq_none_iff' {o : Part α} : o = none ↔ ¬o.Dom :=
⟨fun e => e.symm ▸ id, fun h => eq_none_iff.2 fun _ h' => h h'.fst⟩
#align part.eq_none_iff' Part.eq_none_iff'
@[simp]
theorem not_none_dom : ¬(none : Part α).Dom :=
id
#align part.not_none_dom Part.not_none_dom
@[simp]
theorem some_ne_none (x : α) : some x ≠ none := by
intro h
exact true_ne_false (congr_arg Dom h)
#align part.some_ne_none Part.some_ne_none
@[simp]
theorem none_ne_some (x : α) : none ≠ some x :=
(some_ne_none x).symm
#align part.none_ne_some Part.none_ne_some
theorem ne_none_iff {o : Part α} : o ≠ none ↔ ∃ x, o = some x := by
constructor
· rw [Ne, eq_none_iff', not_not]
exact fun h => ⟨o.get h, eq_some_iff.2 (get_mem h)⟩
· rintro ⟨x, rfl⟩
apply some_ne_none
#align part.ne_none_iff Part.ne_none_iff
theorem eq_none_or_eq_some (o : Part α) : o = none ∨ ∃ x, o = some x :=
or_iff_not_imp_left.2 ne_none_iff.1
#align part.eq_none_or_eq_some Part.eq_none_or_eq_some
theorem some_injective : Injective (@Part.some α) := fun _ _ h =>
congr_fun (eq_of_heq (Part.mk.inj h).2) trivial
#align part.some_injective Part.some_injective
@[simp]
theorem some_inj {a b : α} : Part.some a = some b ↔ a = b :=
some_injective.eq_iff
#align part.some_inj Part.some_inj
@[simp]
theorem some_get {a : Part α} (ha : a.Dom) : Part.some (Part.get a ha) = a :=
Eq.symm (eq_some_iff.2 ⟨ha, rfl⟩)
#align part.some_get Part.some_get
theorem get_eq_iff_eq_some {a : Part α} {ha : a.Dom} {b : α} : a.get ha = b ↔ a = some b :=
⟨fun h => by simp [h.symm], fun h => by simp [h]⟩
#align part.get_eq_iff_eq_some Part.get_eq_iff_eq_some
theorem get_eq_get_of_eq (a : Part α) (ha : a.Dom) {b : Part α} (h : a = b) :
a.get ha = b.get (h ▸ ha) := by
congr
#align part.get_eq_get_of_eq Part.get_eq_get_of_eq
theorem get_eq_iff_mem {o : Part α} {a : α} (h : o.Dom) : o.get h = a ↔ a ∈ o :=
⟨fun H => ⟨h, H⟩, fun ⟨_, H⟩ => H⟩
#align part.get_eq_iff_mem Part.get_eq_iff_mem
theorem eq_get_iff_mem {o : Part α} {a : α} (h : o.Dom) : a = o.get h ↔ a ∈ o :=
eq_comm.trans (get_eq_iff_mem h)
#align part.eq_get_iff_mem Part.eq_get_iff_mem
@[simp]
theorem none_toOption [Decidable (@none α).Dom] : (none : Part α).toOption = Option.none :=
dif_neg id
#align part.none_to_option Part.none_toOption
@[simp]
theorem some_toOption (a : α) [Decidable (some a).Dom] : (some a).toOption = Option.some a :=
dif_pos trivial
#align part.some_to_option Part.some_toOption
instance noneDecidable : Decidable (@none α).Dom :=
instDecidableFalse
#align part.none_decidable Part.noneDecidable
instance someDecidable (a : α) : Decidable (some a).Dom :=
instDecidableTrue
#align part.some_decidable Part.someDecidable
def getOrElse (a : Part α) [Decidable a.Dom] (d : α) :=
if ha : a.Dom then a.get ha else d
#align part.get_or_else Part.getOrElse
theorem getOrElse_of_dom (a : Part α) (h : a.Dom) [Decidable a.Dom] (d : α) :
getOrElse a d = a.get h :=
dif_pos h
#align part.get_or_else_of_dom Part.getOrElse_of_dom
theorem getOrElse_of_not_dom (a : Part α) (h : ¬a.Dom) [Decidable a.Dom] (d : α) :
getOrElse a d = d :=
dif_neg h
#align part.get_or_else_of_not_dom Part.getOrElse_of_not_dom
@[simp]
theorem getOrElse_none (d : α) [Decidable (none : Part α).Dom] : getOrElse none d = d :=
none.getOrElse_of_not_dom not_none_dom d
#align part.get_or_else_none Part.getOrElse_none
@[simp]
theorem getOrElse_some (a : α) (d : α) [Decidable (some a).Dom] : getOrElse (some a) d = a :=
(some a).getOrElse_of_dom (some_dom a) d
#align part.get_or_else_some Part.getOrElse_some
-- Porting note: removed `simp`
theorem mem_toOption {o : Part α} [Decidable o.Dom] {a : α} : a ∈ toOption o ↔ a ∈ o := by
unfold toOption
by_cases h : o.Dom <;> simp [h]
· exact ⟨fun h => ⟨_, h⟩, fun ⟨_, h⟩ => h⟩
· exact mt Exists.fst h
#align part.mem_to_option Part.mem_toOption
-- Porting note (#10756): new theorem, like `mem_toOption` but with LHS in `simp` normal form
@[simp]
theorem toOption_eq_some_iff {o : Part α} [Decidable o.Dom] {a : α} :
toOption o = Option.some a ↔ a ∈ o := by
rw [← Option.mem_def, mem_toOption]
protected theorem Dom.toOption {o : Part α} [Decidable o.Dom] (h : o.Dom) : o.toOption = o.get h :=
dif_pos h
#align part.dom.to_option Part.Dom.toOption
theorem toOption_eq_none_iff {a : Part α} [Decidable a.Dom] : a.toOption = Option.none ↔ ¬a.Dom :=
Ne.dite_eq_right_iff fun _ => Option.some_ne_none _
#align part.to_option_eq_none_iff Part.toOption_eq_none_iff
theorem elim_toOption {α β : Type*} (a : Part α) [Decidable a.Dom] (b : β) (f : α → β) :
a.toOption.elim b f = if h : a.Dom then f (a.get h) else b := by
split_ifs with h
· rw [h.toOption]
rfl
· rw [Part.toOption_eq_none_iff.2 h]
rfl
#align part.elim_to_option Part.elim_toOption
@[coe]
def ofOption : Option α → Part α
| Option.none => none
| Option.some a => some a
#align part.of_option Part.ofOption
@[simp]
theorem mem_ofOption {a : α} : ∀ {o : Option α}, a ∈ ofOption o ↔ a ∈ o
| Option.none => ⟨fun h => h.fst.elim, fun h => Option.noConfusion h⟩
| Option.some _ => ⟨fun h => congr_arg Option.some h.snd, fun h => ⟨trivial, Option.some.inj h⟩⟩
#align part.mem_of_option Part.mem_ofOption
@[simp]
theorem ofOption_dom {α} : ∀ o : Option α, (ofOption o).Dom ↔ o.isSome
| Option.none => by simp [ofOption, none]
| Option.some a => by simp [ofOption]
#align part.of_option_dom Part.ofOption_dom
theorem ofOption_eq_get {α} (o : Option α) : ofOption o = ⟨_, @Option.get _ o⟩ :=
Part.ext' (ofOption_dom o) fun h₁ h₂ => by
cases o
· simp at h₂
· rfl
#align part.of_option_eq_get Part.ofOption_eq_get
instance : Coe (Option α) (Part α) :=
⟨ofOption⟩
theorem mem_coe {a : α} {o : Option α} : a ∈ (o : Part α) ↔ a ∈ o :=
mem_ofOption
#align part.mem_coe Part.mem_coe
@[simp]
theorem coe_none : (@Option.none α : Part α) = none :=
rfl
#align part.coe_none Part.coe_none
@[simp]
theorem coe_some (a : α) : (Option.some a : Part α) = some a :=
rfl
#align part.coe_some Part.coe_some
@[elab_as_elim]
protected theorem induction_on {P : Part α → Prop} (a : Part α) (hnone : P none)
(hsome : ∀ a : α, P (some a)) : P a :=
(Classical.em a.Dom).elim (fun h => Part.some_get h ▸ hsome _) fun h =>
(eq_none_iff'.2 h).symm ▸ hnone
#align part.induction_on Part.induction_on
instance ofOptionDecidable : ∀ o : Option α, Decidable (ofOption o).Dom
| Option.none => Part.noneDecidable
| Option.some a => Part.someDecidable a
#align part.of_option_decidable Part.ofOptionDecidable
@[simp]
theorem to_ofOption (o : Option α) : toOption (ofOption o) = o := by cases o <;> rfl
#align part.to_of_option Part.to_ofOption
@[simp]
theorem of_toOption (o : Part α) [Decidable o.Dom] : ofOption (toOption o) = o :=
ext fun _ => mem_ofOption.trans mem_toOption
#align part.of_to_option Part.of_toOption
noncomputable def equivOption : Part α ≃ Option α :=
haveI := Classical.dec
⟨fun o => toOption o, ofOption, fun o => of_toOption o, fun o =>
Eq.trans (by dsimp; congr) (to_ofOption o)⟩
#align part.equiv_option Part.equivOption
instance : PartialOrder (Part
α) where
le x y := ∀ i, i ∈ x → i ∈ y
le_refl x y := id
le_trans x y z f g i := g _ ∘ f _
le_antisymm x y f g := Part.ext fun z => ⟨f _, g _⟩
instance : OrderBot (Part α) where
bot := none
bot_le := by rintro x _ ⟨⟨_⟩, _⟩
theorem le_total_of_le_of_le {x y : Part α} (z : Part α) (hx : x ≤ z) (hy : y ≤ z) :
x ≤ y ∨ y ≤ x := by
rcases Part.eq_none_or_eq_some x with (h | ⟨b, h₀⟩)
· rw [h]
left
apply OrderBot.bot_le _
right; intro b' h₁
rw [Part.eq_some_iff] at h₀
have hx := hx _ h₀; have hy := hy _ h₁
have hx := Part.mem_unique hx hy; subst hx
exact h₀
#align part.le_total_of_le_of_le Part.le_total_of_le_of_le
def assert (p : Prop) (f : p → Part α) : Part α :=
⟨∃ h : p, (f h).Dom, fun ha => (f ha.fst).get ha.snd⟩
#align part.assert Part.assert
protected def bind (f : Part α) (g : α → Part β) : Part β :=
assert (Dom f) fun b => g (f.get b)
#align part.bind Part.bind
@[simps]
def map (f : α → β) (o : Part α) : Part β :=
⟨o.Dom, f ∘ o.get⟩
#align part.map Part.map
#align part.map_dom Part.map_Dom
#align part.map_get Part.map_get
theorem mem_map (f : α → β) {o : Part α} : ∀ {a}, a ∈ o → f a ∈ map f o
| _, ⟨_, rfl⟩ => ⟨_, rfl⟩
#align part.mem_map Part.mem_map
@[simp]
theorem mem_map_iff (f : α → β) {o : Part α} {b} : b ∈ map f o ↔ ∃ a ∈ o, f a = b :=
⟨fun hb => match b, hb with
| _, ⟨_, rfl⟩ => ⟨_, ⟨_, rfl⟩, rfl⟩,
fun ⟨_, h₁, h₂⟩ => h₂ ▸ mem_map f h₁⟩
#align part.mem_map_iff Part.mem_map_iff
@[simp]
theorem map_none (f : α → β) : map f none = none :=
eq_none_iff.2 fun a => by simp
#align part.map_none Part.map_none
@[simp]
theorem map_some (f : α → β) (a : α) : map f (some a) = some (f a) :=
eq_some_iff.2 <| mem_map f <| mem_some _
#align part.map_some Part.map_some
theorem mem_assert {p : Prop} {f : p → Part α} : ∀ {a} (h : p), a ∈ f h → a ∈ assert p f
| _, x, ⟨h, rfl⟩ => ⟨⟨x, h⟩, rfl⟩
#align part.mem_assert Part.mem_assert
@[simp]
theorem mem_assert_iff {p : Prop} {f : p → Part α} {a} : a ∈ assert p f ↔ ∃ h : p, a ∈ f h :=
⟨fun ha => match a, ha with
| _, ⟨_, rfl⟩ => ⟨_, ⟨_, rfl⟩⟩,
fun ⟨_, h⟩ => mem_assert _ h⟩
#align part.mem_assert_iff Part.mem_assert_iff
theorem assert_pos {p : Prop} {f : p → Part α} (h : p) : assert p f = f h := by
dsimp [assert]
cases h' : f h
simp only [h', mk.injEq, h, exists_prop_of_true, true_and]
apply Function.hfunext
· simp only [h, h', exists_prop_of_true]
· aesop
#align part.assert_pos Part.assert_pos
theorem assert_neg {p : Prop} {f : p → Part α} (h : ¬p) : assert p f = none := by
dsimp [assert, none]; congr
· simp only [h, not_false_iff, exists_prop_of_false]
· apply Function.hfunext
· simp only [h, not_false_iff, exists_prop_of_false]
simp at *
#align part.assert_neg Part.assert_neg
theorem mem_bind {f : Part α} {g : α → Part β} : ∀ {a b}, a ∈ f → b ∈ g a → b ∈ f.bind g
| _, _, ⟨h, rfl⟩, ⟨h₂, rfl⟩ => ⟨⟨h, h₂⟩, rfl⟩
#align part.mem_bind Part.mem_bind
@[simp]
theorem mem_bind_iff {f : Part α} {g : α → Part β} {b} : b ∈ f.bind g ↔ ∃ a ∈ f, b ∈ g a :=
⟨fun hb => match b, hb with
| _, ⟨⟨_, _⟩, rfl⟩ => ⟨_, ⟨_, rfl⟩, ⟨_, rfl⟩⟩,
fun ⟨_, h₁, h₂⟩ => mem_bind h₁ h₂⟩
#align part.mem_bind_iff Part.mem_bind_iff
protected theorem Dom.bind {o : Part α} (h : o.Dom) (f : α → Part β) : o.bind f = f (o.get h) := by
ext b
simp only [Part.mem_bind_iff, exists_prop]
refine ⟨?_, fun hb => ⟨o.get h, Part.get_mem _, hb⟩⟩
rintro ⟨a, ha, hb⟩
rwa [Part.get_eq_of_mem ha]
#align part.dom.bind Part.Dom.bind
theorem Dom.of_bind {f : α → Part β} {a : Part α} (h : (a.bind f).Dom) : a.Dom :=
h.1
#align part.dom.of_bind Part.Dom.of_bind
@[simp]
theorem bind_none (f : α → Part β) : none.bind f = none :=
eq_none_iff.2 fun a => by simp
#align part.bind_none Part.bind_none
@[simp]
theorem bind_some (a : α) (f : α → Part β) : (some a).bind f = f a :=
ext <| by simp
#align part.bind_some Part.bind_some
theorem bind_of_mem {o : Part α} {a : α} (h : a ∈ o) (f : α → Part β) : o.bind f = f a := by
rw [eq_some_iff.2 h, bind_some]
#align part.bind_of_mem Part.bind_of_mem
theorem bind_some_eq_map (f : α → β) (x : Part α) : x.bind (some ∘ f) = map f x :=
ext <| by simp [eq_comm]
#align part.bind_some_eq_map Part.bind_some_eq_map
theorem bind_toOption (f : α → Part β) (o : Part α) [Decidable o.Dom] [∀ a, Decidable (f a).Dom]
[Decidable (o.bind f).Dom] :
(o.bind f).toOption = o.toOption.elim Option.none fun a => (f a).toOption := by
by_cases h : o.Dom
· simp_rw [h.toOption, h.bind]
rfl
· rw [Part.toOption_eq_none_iff.2 h]
exact Part.toOption_eq_none_iff.2 fun ho => h ho.of_bind
#align part.bind_to_option Part.bind_toOption
theorem bind_assoc {γ} (f : Part α) (g : α → Part β) (k : β → Part γ) :
(f.bind g).bind k = f.bind fun x => (g x).bind k :=
ext fun a => by
simp only [mem_bind_iff]
exact ⟨fun ⟨_, ⟨_, h₁, h₂⟩, h₃⟩ => ⟨_, h₁, _, h₂, h₃⟩,
fun ⟨_, h₁, _, h₂, h₃⟩ => ⟨_, ⟨_, h₁, h₂⟩, h₃⟩⟩
#align part.bind_assoc Part.bind_assoc
@[simp]
theorem bind_map {γ} (f : α → β) (x) (g : β → Part γ) :
(map f x).bind g = x.bind fun y => g (f y) := by rw [← bind_some_eq_map, bind_assoc]; simp
#align part.bind_map Part.bind_map
@[simp]
theorem map_bind {γ} (f : α → Part β) (x : Part α) (g : β → γ) :
map g (x.bind f) = x.bind fun y => map g (f y) := by
rw [← bind_some_eq_map, bind_assoc]; simp [bind_some_eq_map]
#align part.map_bind Part.map_bind
theorem map_map (g : β → γ) (f : α → β) (o : Part α) : map g (map f o) = map (g ∘ f) o := by
erw [← bind_some_eq_map, bind_map, bind_some_eq_map]
#align part.map_map Part.map_map
instance : Monad Part where
pure := @some
map := @map
bind := @Part.bind
instance : LawfulMonad
Part where
bind_pure_comp := @bind_some_eq_map
id_map f := by cases f; rfl
pure_bind := @bind_some
bind_assoc := @bind_assoc
map_const := by simp [Functor.mapConst, Functor.map]
--Porting TODO : In Lean3 these were automatic by a tactic
seqLeft_eq x y := ext'
(by simp [SeqLeft.seqLeft, Part.bind, assert, Seq.seq, const, (· <$> ·), and_comm])
(fun _ _ => rfl)
seqRight_eq x y := ext'
(by simp [SeqRight.seqRight, Part.bind, assert, Seq.seq, const, (· <$> ·), and_comm])
(fun _ _ => rfl)
pure_seq x y := ext'
(by simp [Seq.seq, Part.bind, assert, (· <$> ·), pure])
(fun _ _ => rfl)
bind_map x y := ext'
(by simp [(· >>= ·), Part.bind, assert, Seq.seq, get, (· <$> ·)] )
(fun _ _ => rfl)
theorem map_id' {f : α → α} (H : ∀ x : α, f x = x) (o) : map f o = o := by
rw [show f = id from funext H]; exact id_map o
#align part.map_id' Part.map_id'
@[simp]
theorem bind_some_right (x : Part α) : x.bind some = x := by
erw [bind_some_eq_map]; simp [map_id']
#align part.bind_some_right Part.bind_some_right
@[simp]
theorem pure_eq_some (a : α) : pure a = some a :=
rfl
#align part.pure_eq_some Part.pure_eq_some
@[simp]
theorem ret_eq_some (a : α) : (return a : Part α) = some a :=
rfl
#align part.ret_eq_some Part.ret_eq_some
@[simp]
theorem map_eq_map {α β} (f : α → β) (o : Part α) : f <$> o = map f o :=
rfl
#align part.map_eq_map Part.map_eq_map
@[simp]
theorem bind_eq_bind {α β} (f : Part α) (g : α → Part β) : f >>= g = f.bind g :=
rfl
#align part.bind_eq_bind Part.bind_eq_bind
theorem bind_le {α} (x : Part α) (f : α → Part β) (y : Part β) :
x >>= f ≤ y ↔ ∀ a, a ∈ x → f a ≤ y := by
constructor <;> intro h
· intro a h' b
have h := h b
simp only [and_imp, exists_prop, bind_eq_bind, mem_bind_iff, exists_imp] at h
apply h _ h'
· intro b h'
simp only [exists_prop, bind_eq_bind, mem_bind_iff] at h'
rcases h' with ⟨a, h₀, h₁⟩
apply h _ h₀ _ h₁
#align part.bind_le Part.bind_le
-- Porting note: No MonadFail in Lean4 yet
-- instance : MonadFail Part :=
-- { Part.monad with fail := fun _ _ => none }
def restrict (p : Prop) (o : Part α) (H : p → o.Dom) : Part α :=
⟨p, fun h => o.get (H h)⟩
#align part.restrict Part.restrict
@[simp]
theorem mem_restrict (p : Prop) (o : Part α) (h : p → o.Dom) (a : α) :
a ∈ restrict p o h ↔ p ∧ a ∈ o := by
dsimp [restrict, mem_eq]; constructor
· rintro ⟨h₀, h₁⟩
exact ⟨h₀, ⟨_, h₁⟩⟩
rintro ⟨h₀, _, h₂⟩; exact ⟨h₀, h₂⟩
#align part.mem_restrict Part.mem_restrict
unsafe def unwrap (o : Part α) : α :=
o.get lcProof
#align part.unwrap Part.unwrap
theorem assert_defined {p : Prop} {f : p → Part α} : ∀ h : p, (f h).Dom → (assert p f).Dom :=
Exists.intro
#align part.assert_defined Part.assert_defined
theorem bind_defined {f : Part α} {g : α → Part β} :
∀ h : f.Dom, (g (f.get h)).Dom → (f.bind g).Dom :=
assert_defined
#align part.bind_defined Part.bind_defined
@[simp]
theorem bind_dom {f : Part α} {g : α → Part β} : (f.bind g).Dom ↔ ∃ h : f.Dom, (g (f.get h)).Dom :=
Iff.rfl
#align part.bind_dom Part.bind_dom
section Instances
@[to_additive]
instance [One α] : One (Part α) where one := pure 1
@[to_additive]
instance [Mul α] : Mul (Part α) where mul a b := (· * ·) <$> a <*> b
@[to_additive]
instance [Inv α] : Inv (Part α) where inv := map Inv.inv
@[to_additive]
instance [Div α] : Div (Part α) where div a b := (· / ·) <$> a <*> b
instance [Mod α] : Mod (Part α) where mod a b := (· % ·) <$> a <*> b
instance [Append α] : Append (Part α) where append a b := (· ++ ·) <$> a <*> b
instance [Inter α] : Inter (Part α) where inter a b := (· ∩ ·) <$> a <*> b
instance [Union α] : Union (Part α) where union a b := (· ∪ ·) <$> a <*> b
instance [SDiff α] : SDiff (Part α) where sdiff a b := (· \ ·) <$> a <*> b
section
-- Porting note (#10756): new theorems to unfold definitions
theorem mul_def [Mul α] (a b : Part α) : a * b = bind a fun y ↦ map (y * ·) b := rfl
theorem one_def [One α] : (1 : Part α) = some 1 := rfl
theorem inv_def [Inv α] (a : Part α) : a⁻¹ = Part.map (· ⁻¹) a := rfl
theorem div_def [Div α] (a b : Part α) : a / b = bind a fun y => map (y / ·) b := rfl
theorem mod_def [Mod α] (a b : Part α) : a % b = bind a fun y => map (y % ·) b := rfl
theorem append_def [Append α] (a b : Part α) : a ++ b = bind a fun y => map (y ++ ·) b := rfl
theorem inter_def [Inter α] (a b : Part α) : a ∩ b = bind a fun y => map (y ∩ ·) b := rfl
theorem union_def [Union α] (a b : Part α) : a ∪ b = bind a fun y => map (y ∪ ·) b := rfl
theorem sdiff_def [SDiff α] (a b : Part α) : a \ b = bind a fun y => map (y \ ·) b := rfl
end
@[to_additive]
theorem one_mem_one [One α] : (1 : α) ∈ (1 : Part α) :=
⟨trivial, rfl⟩
#align part.one_mem_one Part.one_mem_one
#align part.zero_mem_zero Part.zero_mem_zero
@[to_additive]
theorem mul_mem_mul [Mul α] (a b : Part α) (ma mb : α) (ha : ma ∈ a) (hb : mb ∈ b) :
ma * mb ∈ a * b := ⟨⟨ha.1, hb.1⟩, by simp only [← ha.2, ← hb.2]; rfl⟩
#align part.mul_mem_mul Part.mul_mem_mul
#align part.add_mem_add Part.add_mem_add
@[to_additive]
theorem left_dom_of_mul_dom [Mul α] {a b : Part α} (hab : Dom (a * b)) : a.Dom := hab.1
#align part.left_dom_of_mul_dom Part.left_dom_of_mul_dom
#align part.left_dom_of_add_dom Part.left_dom_of_add_dom
@[to_additive]
theorem right_dom_of_mul_dom [Mul α] {a b : Part α} (hab : Dom (a * b)) : b.Dom := hab.2
#align part.right_dom_of_mul_dom Part.right_dom_of_mul_dom
#align part.right_dom_of_add_dom Part.right_dom_of_add_dom
@[to_additive (attr := simp)]
theorem mul_get_eq [Mul α] (a b : Part α) (hab : Dom (a * b)) :
(a * b).get hab = a.get (left_dom_of_mul_dom hab) * b.get (right_dom_of_mul_dom hab) := rfl
#align part.mul_get_eq Part.mul_get_eq
#align part.add_get_eq Part.add_get_eq
@[to_additive]
theorem some_mul_some [Mul α] (a b : α) : some a * some b = some (a * b) := by simp [mul_def]
#align part.some_mul_some Part.some_mul_some
#align part.some_add_some Part.some_add_some
@[to_additive]
theorem inv_mem_inv [Inv α] (a : Part α) (ma : α) (ha : ma ∈ a) : ma⁻¹ ∈ a⁻¹ := by
simp [inv_def]; aesop
#align part.inv_mem_inv Part.inv_mem_inv
#align part.neg_mem_neg Part.neg_mem_neg
@[to_additive]
theorem inv_some [Inv α] (a : α) : (some a)⁻¹ = some a⁻¹ :=
rfl
#align part.inv_some Part.inv_some
#align part.neg_some Part.neg_some
@[to_additive]
theorem div_mem_div [Div α] (a b : Part α) (ma mb : α) (ha : ma ∈ a) (hb : mb ∈ b) :
ma / mb ∈ a / b := by simp [div_def]; aesop
#align part.div_mem_div Part.div_mem_div
#align part.sub_mem_sub Part.sub_mem_sub
@[to_additive]
theorem left_dom_of_div_dom [Div α] {a b : Part α} (hab : Dom (a / b)) : a.Dom := hab.1
#align part.left_dom_of_div_dom Part.left_dom_of_div_dom
#align part.left_dom_of_sub_dom Part.left_dom_of_sub_dom
@[to_additive]
theorem right_dom_of_div_dom [Div α] {a b : Part α} (hab : Dom (a / b)) : b.Dom := hab.2
#align part.right_dom_of_div_dom Part.right_dom_of_div_dom
#align part.right_dom_of_sub_dom Part.right_dom_of_sub_dom
@[to_additive (attr := simp)]
theorem div_get_eq [Div α] (a b : Part α) (hab : Dom (a / b)) :
(a / b).get hab = a.get (left_dom_of_div_dom hab) / b.get (right_dom_of_div_dom hab) := by
simp [div_def]; aesop
#align part.div_get_eq Part.div_get_eq
#align part.sub_get_eq Part.sub_get_eq
@[to_additive]
theorem some_div_some [Div α] (a b : α) : some a / some b = some (a / b) := by simp [div_def]
#align part.some_div_some Part.some_div_some
#align part.some_sub_some Part.some_sub_some
theorem mod_mem_mod [Mod α] (a b : Part α) (ma mb : α) (ha : ma ∈ a) (hb : mb ∈ b) :
ma % mb ∈ a % b := by simp [mod_def]; aesop
#align part.mod_mem_mod Part.mod_mem_mod
theorem left_dom_of_mod_dom [Mod α] {a b : Part α} (hab : Dom (a % b)) : a.Dom := hab.1
#align part.left_dom_of_mod_dom Part.left_dom_of_mod_dom
theorem right_dom_of_mod_dom [Mod α] {a b : Part α} (hab : Dom (a % b)) : b.Dom := hab.2
#align part.right_dom_of_mod_dom Part.right_dom_of_mod_dom
@[simp]
theorem mod_get_eq [Mod α] (a b : Part α) (hab : Dom (a % b)) :
(a % b).get hab = a.get (left_dom_of_mod_dom hab) % b.get (right_dom_of_mod_dom hab) := by
simp [mod_def]; aesop
#align part.mod_get_eq Part.mod_get_eq
| Mathlib/Data/Part.lean | 800 | 800 | theorem some_mod_some [Mod α] (a b : α) : some a % some b = some (a % b) := by | simp [mod_def]
|
import Mathlib.Algebra.Ring.Prod
import Mathlib.GroupTheory.OrderOfElement
import Mathlib.Tactic.FinCases
#align_import data.zmod.basic from "leanprover-community/mathlib"@"74ad1c88c77e799d2fea62801d1dbbd698cff1b7"
assert_not_exists Submodule
open Function
namespace ZMod
instance charZero : CharZero (ZMod 0) := inferInstanceAs (CharZero ℤ)
def val : ∀ {n : ℕ}, ZMod n → ℕ
| 0 => Int.natAbs
| n + 1 => ((↑) : Fin (n + 1) → ℕ)
#align zmod.val ZMod.val
theorem val_lt {n : ℕ} [NeZero n] (a : ZMod n) : a.val < n := by
cases n
· cases NeZero.ne 0 rfl
exact Fin.is_lt a
#align zmod.val_lt ZMod.val_lt
theorem val_le {n : ℕ} [NeZero n] (a : ZMod n) : a.val ≤ n :=
a.val_lt.le
#align zmod.val_le ZMod.val_le
@[simp]
theorem val_zero : ∀ {n}, (0 : ZMod n).val = 0
| 0 => rfl
| _ + 1 => rfl
#align zmod.val_zero ZMod.val_zero
@[simp]
theorem val_one' : (1 : ZMod 0).val = 1 :=
rfl
#align zmod.val_one' ZMod.val_one'
@[simp]
theorem val_neg' {n : ZMod 0} : (-n).val = n.val :=
Int.natAbs_neg n
#align zmod.val_neg' ZMod.val_neg'
@[simp]
theorem val_mul' {m n : ZMod 0} : (m * n).val = m.val * n.val :=
Int.natAbs_mul m n
#align zmod.val_mul' ZMod.val_mul'
@[simp]
theorem val_natCast {n : ℕ} (a : ℕ) : (a : ZMod n).val = a % n := by
cases n
· rw [Nat.mod_zero]
exact Int.natAbs_ofNat a
· apply Fin.val_natCast
#align zmod.val_nat_cast ZMod.val_natCast
@[deprecated (since := "2024-04-17")]
alias val_nat_cast := val_natCast
theorem val_unit' {n : ZMod 0} : IsUnit n ↔ n.val = 1 := by
simp only [val]
rw [Int.isUnit_iff, Int.natAbs_eq_iff, Nat.cast_one]
lemma eq_one_of_isUnit_natCast {n : ℕ} (h : IsUnit (n : ZMod 0)) : n = 1 := by
rw [← Nat.mod_zero n, ← val_natCast, val_unit'.mp h]
theorem val_natCast_of_lt {n a : ℕ} (h : a < n) : (a : ZMod n).val = a := by
rwa [val_natCast, Nat.mod_eq_of_lt]
@[deprecated (since := "2024-04-17")]
alias val_nat_cast_of_lt := val_natCast_of_lt
instance charP (n : ℕ) : CharP (ZMod n) n where
cast_eq_zero_iff' := by
intro k
cases' n with n
· simp [zero_dvd_iff, Int.natCast_eq_zero, Nat.zero_eq]
· exact Fin.natCast_eq_zero
@[simp]
theorem addOrderOf_one (n : ℕ) : addOrderOf (1 : ZMod n) = n :=
CharP.eq _ (CharP.addOrderOf_one _) (ZMod.charP n)
#align zmod.add_order_of_one ZMod.addOrderOf_one
@[simp]
theorem addOrderOf_coe (a : ℕ) {n : ℕ} (n0 : n ≠ 0) : addOrderOf (a : ZMod n) = n / n.gcd a := by
cases' a with a
· simp only [Nat.zero_eq, Nat.cast_zero, addOrderOf_zero, Nat.gcd_zero_right,
Nat.pos_of_ne_zero n0, Nat.div_self]
rw [← Nat.smul_one_eq_cast, addOrderOf_nsmul' _ a.succ_ne_zero, ZMod.addOrderOf_one]
#align zmod.add_order_of_coe ZMod.addOrderOf_coe
@[simp]
theorem addOrderOf_coe' {a : ℕ} (n : ℕ) (a0 : a ≠ 0) : addOrderOf (a : ZMod n) = n / n.gcd a := by
rw [← Nat.smul_one_eq_cast, addOrderOf_nsmul' _ a0, ZMod.addOrderOf_one]
#align zmod.add_order_of_coe' ZMod.addOrderOf_coe'
theorem ringChar_zmod_n (n : ℕ) : ringChar (ZMod n) = n := by
rw [ringChar.eq_iff]
exact ZMod.charP n
#align zmod.ring_char_zmod_n ZMod.ringChar_zmod_n
-- @[simp] -- Porting note (#10618): simp can prove this
theorem natCast_self (n : ℕ) : (n : ZMod n) = 0 :=
CharP.cast_eq_zero (ZMod n) n
#align zmod.nat_cast_self ZMod.natCast_self
@[deprecated (since := "2024-04-17")]
alias nat_cast_self := natCast_self
@[simp]
theorem natCast_self' (n : ℕ) : (n + 1 : ZMod (n + 1)) = 0 := by
rw [← Nat.cast_add_one, natCast_self (n + 1)]
#align zmod.nat_cast_self' ZMod.natCast_self'
@[deprecated (since := "2024-04-17")]
alias nat_cast_self' := natCast_self'
section UniversalProperty
variable {n : ℕ} {R : Type*}
section
variable [AddGroupWithOne R]
def cast : ∀ {n : ℕ}, ZMod n → R
| 0 => Int.cast
| _ + 1 => fun i => i.val
#align zmod.cast ZMod.cast
@[simp]
theorem cast_zero : (cast (0 : ZMod n) : R) = 0 := by
delta ZMod.cast
cases n
· exact Int.cast_zero
· simp
#align zmod.cast_zero ZMod.cast_zero
theorem cast_eq_val [NeZero n] (a : ZMod n) : (cast a : R) = a.val := by
cases n
· cases NeZero.ne 0 rfl
rfl
#align zmod.cast_eq_val ZMod.cast_eq_val
variable {S : Type*} [AddGroupWithOne S]
@[simp]
theorem _root_.Prod.fst_zmod_cast (a : ZMod n) : (cast a : R × S).fst = cast a := by
cases n
· rfl
· simp [ZMod.cast]
#align prod.fst_zmod_cast Prod.fst_zmod_cast
@[simp]
theorem _root_.Prod.snd_zmod_cast (a : ZMod n) : (cast a : R × S).snd = cast a := by
cases n
· rfl
· simp [ZMod.cast]
#align prod.snd_zmod_cast Prod.snd_zmod_cast
end
theorem natCast_zmod_val {n : ℕ} [NeZero n] (a : ZMod n) : (a.val : ZMod n) = a := by
cases n
· cases NeZero.ne 0 rfl
· apply Fin.cast_val_eq_self
#align zmod.nat_cast_zmod_val ZMod.natCast_zmod_val
@[deprecated (since := "2024-04-17")]
alias nat_cast_zmod_val := natCast_zmod_val
theorem natCast_rightInverse [NeZero n] : Function.RightInverse val ((↑) : ℕ → ZMod n) :=
natCast_zmod_val
#align zmod.nat_cast_right_inverse ZMod.natCast_rightInverse
@[deprecated (since := "2024-04-17")]
alias nat_cast_rightInverse := natCast_rightInverse
theorem natCast_zmod_surjective [NeZero n] : Function.Surjective ((↑) : ℕ → ZMod n) :=
natCast_rightInverse.surjective
#align zmod.nat_cast_zmod_surjective ZMod.natCast_zmod_surjective
@[deprecated (since := "2024-04-17")]
alias nat_cast_zmod_surjective := natCast_zmod_surjective
@[norm_cast]
theorem intCast_zmod_cast (a : ZMod n) : ((cast a : ℤ) : ZMod n) = a := by
cases n
· simp [ZMod.cast, ZMod]
· dsimp [ZMod.cast, ZMod]
erw [Int.cast_natCast, Fin.cast_val_eq_self]
#align zmod.int_cast_zmod_cast ZMod.intCast_zmod_cast
@[deprecated (since := "2024-04-17")]
alias int_cast_zmod_cast := intCast_zmod_cast
theorem intCast_rightInverse : Function.RightInverse (cast : ZMod n → ℤ) ((↑) : ℤ → ZMod n) :=
intCast_zmod_cast
#align zmod.int_cast_right_inverse ZMod.intCast_rightInverse
@[deprecated (since := "2024-04-17")]
alias int_cast_rightInverse := intCast_rightInverse
theorem intCast_surjective : Function.Surjective ((↑) : ℤ → ZMod n) :=
intCast_rightInverse.surjective
#align zmod.int_cast_surjective ZMod.intCast_surjective
@[deprecated (since := "2024-04-17")]
alias int_cast_surjective := intCast_surjective
theorem cast_id : ∀ (n) (i : ZMod n), (ZMod.cast i : ZMod n) = i
| 0, _ => Int.cast_id
| _ + 1, i => natCast_zmod_val i
#align zmod.cast_id ZMod.cast_id
@[simp]
theorem cast_id' : (ZMod.cast : ZMod n → ZMod n) = id :=
funext (cast_id n)
#align zmod.cast_id' ZMod.cast_id'
variable (R) [Ring R]
@[simp]
theorem natCast_comp_val [NeZero n] : ((↑) : ℕ → R) ∘ (val : ZMod n → ℕ) = cast := by
cases n
· cases NeZero.ne 0 rfl
rfl
#align zmod.nat_cast_comp_val ZMod.natCast_comp_val
@[deprecated (since := "2024-04-17")]
alias nat_cast_comp_val := natCast_comp_val
@[simp]
theorem intCast_comp_cast : ((↑) : ℤ → R) ∘ (cast : ZMod n → ℤ) = cast := by
cases n
· exact congr_arg (Int.cast ∘ ·) ZMod.cast_id'
· ext
simp [ZMod, ZMod.cast]
#align zmod.int_cast_comp_cast ZMod.intCast_comp_cast
@[deprecated (since := "2024-04-17")]
alias int_cast_comp_cast := intCast_comp_cast
variable {R}
@[simp]
theorem natCast_val [NeZero n] (i : ZMod n) : (i.val : R) = cast i :=
congr_fun (natCast_comp_val R) i
#align zmod.nat_cast_val ZMod.natCast_val
@[deprecated (since := "2024-04-17")]
alias nat_cast_val := natCast_val
@[simp]
theorem intCast_cast (i : ZMod n) : ((cast i : ℤ) : R) = cast i :=
congr_fun (intCast_comp_cast R) i
#align zmod.int_cast_cast ZMod.intCast_cast
@[deprecated (since := "2024-04-17")]
alias int_cast_cast := intCast_cast
theorem cast_add_eq_ite {n : ℕ} (a b : ZMod n) :
(cast (a + b) : ℤ) =
if (n : ℤ) ≤ cast a + cast b then (cast a + cast b - n : ℤ) else cast a + cast b := by
cases' n with n
· simp; rfl
change Fin (n + 1) at a b
change ((((a + b) : Fin (n + 1)) : ℕ) : ℤ) = if ((n + 1 : ℕ) : ℤ) ≤ (a : ℕ) + b then _ else _
simp only [Fin.val_add_eq_ite, Int.ofNat_succ, Int.ofNat_le]
norm_cast
split_ifs with h
· rw [Nat.cast_sub h]
congr
· rfl
#align zmod.coe_add_eq_ite ZMod.cast_add_eq_ite
theorem intCast_eq_intCast_iff (a b : ℤ) (c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a ≡ b [ZMOD c] :=
CharP.intCast_eq_intCast (ZMod c) c
#align zmod.int_coe_eq_int_coe_iff ZMod.intCast_eq_intCast_iff
@[deprecated (since := "2024-04-17")]
alias int_cast_eq_int_cast_iff := intCast_eq_intCast_iff
theorem intCast_eq_intCast_iff' (a b : ℤ) (c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a % c = b % c :=
ZMod.intCast_eq_intCast_iff a b c
#align zmod.int_coe_eq_int_coe_iff' ZMod.intCast_eq_intCast_iff'
@[deprecated (since := "2024-04-17")]
alias int_cast_eq_int_cast_iff' := intCast_eq_intCast_iff'
theorem natCast_eq_natCast_iff (a b c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a ≡ b [MOD c] := by
simpa [Int.natCast_modEq_iff] using ZMod.intCast_eq_intCast_iff a b c
#align zmod.nat_coe_eq_nat_coe_iff ZMod.natCast_eq_natCast_iff
@[deprecated (since := "2024-04-17")]
alias nat_cast_eq_nat_cast_iff := natCast_eq_natCast_iff
theorem natCast_eq_natCast_iff' (a b c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a % c = b % c :=
ZMod.natCast_eq_natCast_iff a b c
#align zmod.nat_coe_eq_nat_coe_iff' ZMod.natCast_eq_natCast_iff'
@[deprecated (since := "2024-04-17")]
alias nat_cast_eq_nat_cast_iff' := natCast_eq_natCast_iff'
theorem intCast_zmod_eq_zero_iff_dvd (a : ℤ) (b : ℕ) : (a : ZMod b) = 0 ↔ (b : ℤ) ∣ a := by
rw [← Int.cast_zero, ZMod.intCast_eq_intCast_iff, Int.modEq_zero_iff_dvd]
#align zmod.int_coe_zmod_eq_zero_iff_dvd ZMod.intCast_zmod_eq_zero_iff_dvd
@[deprecated (since := "2024-04-17")]
alias int_cast_zmod_eq_zero_iff_dvd := intCast_zmod_eq_zero_iff_dvd
theorem intCast_eq_intCast_iff_dvd_sub (a b : ℤ) (c : ℕ) : (a : ZMod c) = ↑b ↔ ↑c ∣ b - a := by
rw [ZMod.intCast_eq_intCast_iff, Int.modEq_iff_dvd]
#align zmod.int_coe_eq_int_coe_iff_dvd_sub ZMod.intCast_eq_intCast_iff_dvd_sub
@[deprecated (since := "2024-04-17")]
alias int_cast_eq_int_cast_iff_dvd_sub := intCast_eq_intCast_iff_dvd_sub
theorem natCast_zmod_eq_zero_iff_dvd (a b : ℕ) : (a : ZMod b) = 0 ↔ b ∣ a := by
rw [← Nat.cast_zero, ZMod.natCast_eq_natCast_iff, Nat.modEq_zero_iff_dvd]
#align zmod.nat_coe_zmod_eq_zero_iff_dvd ZMod.natCast_zmod_eq_zero_iff_dvd
@[deprecated (since := "2024-04-17")]
alias nat_cast_zmod_eq_zero_iff_dvd := natCast_zmod_eq_zero_iff_dvd
theorem val_intCast {n : ℕ} (a : ℤ) [NeZero n] : ↑(a : ZMod n).val = a % n := by
have hle : (0 : ℤ) ≤ ↑(a : ZMod n).val := Int.natCast_nonneg _
have hlt : ↑(a : ZMod n).val < (n : ℤ) := Int.ofNat_lt.mpr (ZMod.val_lt a)
refine (Int.emod_eq_of_lt hle hlt).symm.trans ?_
rw [← ZMod.intCast_eq_intCast_iff', Int.cast_natCast, ZMod.natCast_val, ZMod.cast_id]
#align zmod.val_int_cast ZMod.val_intCast
@[deprecated (since := "2024-04-17")]
alias val_int_cast := val_intCast
theorem coe_intCast {n : ℕ} (a : ℤ) : cast (a : ZMod n) = a % n := by
cases n
· rw [Int.ofNat_zero, Int.emod_zero, Int.cast_id]; rfl
· rw [← val_intCast, val]; rfl
#align zmod.coe_int_cast ZMod.coe_intCast
@[deprecated (since := "2024-04-17")]
alias coe_int_cast := coe_intCast
@[simp]
theorem val_neg_one (n : ℕ) : (-1 : ZMod n.succ).val = n := by
dsimp [val, Fin.coe_neg]
cases n
· simp [Nat.mod_one]
· dsimp [ZMod, ZMod.cast]
rw [Fin.coe_neg_one]
#align zmod.val_neg_one ZMod.val_neg_one
theorem cast_neg_one {R : Type*} [Ring R] (n : ℕ) : cast (-1 : ZMod n) = (n - 1 : R) := by
cases' n with n
· dsimp [ZMod, ZMod.cast]; simp
· rw [← natCast_val, val_neg_one, Nat.cast_succ, add_sub_cancel_right]
#align zmod.cast_neg_one ZMod.cast_neg_one
theorem cast_sub_one {R : Type*} [Ring R] {n : ℕ} (k : ZMod n) :
(cast (k - 1 : ZMod n) : R) = (if k = 0 then (n : R) else cast k) - 1 := by
split_ifs with hk
· rw [hk, zero_sub, ZMod.cast_neg_one]
· cases n
· dsimp [ZMod, ZMod.cast]
rw [Int.cast_sub, Int.cast_one]
· dsimp [ZMod, ZMod.cast, ZMod.val]
rw [Fin.coe_sub_one, if_neg]
· rw [Nat.cast_sub, Nat.cast_one]
rwa [Fin.ext_iff, Fin.val_zero, ← Ne, ← Nat.one_le_iff_ne_zero] at hk
· exact hk
#align zmod.cast_sub_one ZMod.cast_sub_one
theorem natCast_eq_iff (p : ℕ) (n : ℕ) (z : ZMod p) [NeZero p] :
↑n = z ↔ ∃ k, n = z.val + p * k := by
constructor
· rintro rfl
refine ⟨n / p, ?_⟩
rw [val_natCast, Nat.mod_add_div]
· rintro ⟨k, rfl⟩
rw [Nat.cast_add, natCast_zmod_val, Nat.cast_mul, natCast_self, zero_mul,
add_zero]
#align zmod.nat_coe_zmod_eq_iff ZMod.natCast_eq_iff
theorem intCast_eq_iff (p : ℕ) (n : ℤ) (z : ZMod p) [NeZero p] :
↑n = z ↔ ∃ k, n = z.val + p * k := by
constructor
· rintro rfl
refine ⟨n / p, ?_⟩
rw [val_intCast, Int.emod_add_ediv]
· rintro ⟨k, rfl⟩
rw [Int.cast_add, Int.cast_mul, Int.cast_natCast, Int.cast_natCast, natCast_val,
ZMod.natCast_self, zero_mul, add_zero, cast_id]
#align zmod.int_coe_zmod_eq_iff ZMod.intCast_eq_iff
@[deprecated (since := "2024-05-25")] alias nat_coe_zmod_eq_iff := natCast_eq_iff
@[deprecated (since := "2024-05-25")] alias int_coe_zmod_eq_iff := intCast_eq_iff
@[push_cast, simp]
theorem intCast_mod (a : ℤ) (b : ℕ) : ((a % b : ℤ) : ZMod b) = (a : ZMod b) := by
rw [ZMod.intCast_eq_intCast_iff]
apply Int.mod_modEq
#align zmod.int_cast_mod ZMod.intCast_mod
@[deprecated (since := "2024-04-17")]
alias int_cast_mod := intCast_mod
| Mathlib/Data/ZMod/Basic.lean | 684 | 688 | theorem ker_intCastAddHom (n : ℕ) :
(Int.castAddHom (ZMod n)).ker = AddSubgroup.zmultiples (n : ℤ) := by |
ext
rw [Int.mem_zmultiples_iff, AddMonoidHom.mem_ker, Int.coe_castAddHom,
intCast_zmod_eq_zero_iff_dvd]
|
import Mathlib.Order.PropInstances
#align_import order.heyting.basic from "leanprover-community/mathlib"@"9ac7c0c8c4d7a535ec3e5b34b8859aab9233b2f4"
open Function OrderDual
universe u
variable {ι α β : Type*}
section
variable (α β)
instance Prod.instHImp [HImp α] [HImp β] : HImp (α × β) :=
⟨fun a b => (a.1 ⇨ b.1, a.2 ⇨ b.2)⟩
instance Prod.instHNot [HNot α] [HNot β] : HNot (α × β) :=
⟨fun a => (¬a.1, ¬a.2)⟩
instance Prod.instSDiff [SDiff α] [SDiff β] : SDiff (α × β) :=
⟨fun a b => (a.1 \ b.1, a.2 \ b.2)⟩
instance Prod.instHasCompl [HasCompl α] [HasCompl β] : HasCompl (α × β) :=
⟨fun a => (a.1ᶜ, a.2ᶜ)⟩
end
@[simp]
theorem fst_himp [HImp α] [HImp β] (a b : α × β) : (a ⇨ b).1 = a.1 ⇨ b.1 :=
rfl
#align fst_himp fst_himp
@[simp]
theorem snd_himp [HImp α] [HImp β] (a b : α × β) : (a ⇨ b).2 = a.2 ⇨ b.2 :=
rfl
#align snd_himp snd_himp
@[simp]
theorem fst_hnot [HNot α] [HNot β] (a : α × β) : (¬a).1 = ¬a.1 :=
rfl
#align fst_hnot fst_hnot
@[simp]
theorem snd_hnot [HNot α] [HNot β] (a : α × β) : (¬a).2 = ¬a.2 :=
rfl
#align snd_hnot snd_hnot
@[simp]
theorem fst_sdiff [SDiff α] [SDiff β] (a b : α × β) : (a \ b).1 = a.1 \ b.1 :=
rfl
#align fst_sdiff fst_sdiff
@[simp]
theorem snd_sdiff [SDiff α] [SDiff β] (a b : α × β) : (a \ b).2 = a.2 \ b.2 :=
rfl
#align snd_sdiff snd_sdiff
@[simp]
theorem fst_compl [HasCompl α] [HasCompl β] (a : α × β) : aᶜ.1 = a.1ᶜ :=
rfl
#align fst_compl fst_compl
@[simp]
theorem snd_compl [HasCompl α] [HasCompl β] (a : α × β) : aᶜ.2 = a.2ᶜ :=
rfl
#align snd_compl snd_compl
class GeneralizedHeytingAlgebra (α : Type*) extends Lattice α, OrderTop α, HImp α where
le_himp_iff (a b c : α) : a ≤ b ⇨ c ↔ a ⊓ b ≤ c
#align generalized_heyting_algebra GeneralizedHeytingAlgebra
#align generalized_heyting_algebra.to_order_top GeneralizedHeytingAlgebra.toOrderTop
class GeneralizedCoheytingAlgebra (α : Type*) extends Lattice α, OrderBot α, SDiff α where
sdiff_le_iff (a b c : α) : a \ b ≤ c ↔ a ≤ b ⊔ c
#align generalized_coheyting_algebra GeneralizedCoheytingAlgebra
#align generalized_coheyting_algebra.to_order_bot GeneralizedCoheytingAlgebra.toOrderBot
class HeytingAlgebra (α : Type*) extends GeneralizedHeytingAlgebra α, OrderBot α, HasCompl α where
himp_bot (a : α) : a ⇨ ⊥ = aᶜ
#align heyting_algebra HeytingAlgebra
class CoheytingAlgebra (α : Type*) extends GeneralizedCoheytingAlgebra α, OrderTop α, HNot α where
top_sdiff (a : α) : ⊤ \ a = ¬a
#align coheyting_algebra CoheytingAlgebra
class BiheytingAlgebra (α : Type*) extends HeytingAlgebra α, SDiff α, HNot α where
sdiff_le_iff (a b c : α) : a \ b ≤ c ↔ a ≤ b ⊔ c
top_sdiff (a : α) : ⊤ \ a = ¬a
#align biheyting_algebra BiheytingAlgebra
-- See note [lower instance priority]
attribute [instance 100] GeneralizedHeytingAlgebra.toOrderTop
attribute [instance 100] GeneralizedCoheytingAlgebra.toOrderBot
-- See note [lower instance priority]
instance (priority := 100) HeytingAlgebra.toBoundedOrder [HeytingAlgebra α] : BoundedOrder α :=
{ bot_le := ‹HeytingAlgebra α›.bot_le }
--#align heyting_algebra.to_bounded_order HeytingAlgebra.toBoundedOrder
-- See note [lower instance priority]
instance (priority := 100) CoheytingAlgebra.toBoundedOrder [CoheytingAlgebra α] : BoundedOrder α :=
{ ‹CoheytingAlgebra α› with }
#align coheyting_algebra.to_bounded_order CoheytingAlgebra.toBoundedOrder
-- See note [lower instance priority]
instance (priority := 100) BiheytingAlgebra.toCoheytingAlgebra [BiheytingAlgebra α] :
CoheytingAlgebra α :=
{ ‹BiheytingAlgebra α› with }
#align biheyting_algebra.to_coheyting_algebra BiheytingAlgebra.toCoheytingAlgebra
-- See note [reducible non-instances]
abbrev HeytingAlgebra.ofHImp [DistribLattice α] [BoundedOrder α] (himp : α → α → α)
(le_himp_iff : ∀ a b c, a ≤ himp b c ↔ a ⊓ b ≤ c) : HeytingAlgebra α :=
{ ‹DistribLattice α›, ‹BoundedOrder α› with
himp,
compl := fun a => himp a ⊥,
le_himp_iff,
himp_bot := fun a => rfl }
#align heyting_algebra.of_himp HeytingAlgebra.ofHImp
-- See note [reducible non-instances]
abbrev HeytingAlgebra.ofCompl [DistribLattice α] [BoundedOrder α] (compl : α → α)
(le_himp_iff : ∀ a b c, a ≤ compl b ⊔ c ↔ a ⊓ b ≤ c) : HeytingAlgebra α where
himp := (compl · ⊔ ·)
compl := compl
le_himp_iff := le_himp_iff
himp_bot _ := sup_bot_eq _
#align heyting_algebra.of_compl HeytingAlgebra.ofCompl
-- See note [reducible non-instances]
abbrev CoheytingAlgebra.ofSDiff [DistribLattice α] [BoundedOrder α] (sdiff : α → α → α)
(sdiff_le_iff : ∀ a b c, sdiff a b ≤ c ↔ a ≤ b ⊔ c) : CoheytingAlgebra α :=
{ ‹DistribLattice α›, ‹BoundedOrder α› with
sdiff,
hnot := fun a => sdiff ⊤ a,
sdiff_le_iff,
top_sdiff := fun a => rfl }
#align coheyting_algebra.of_sdiff CoheytingAlgebra.ofSDiff
-- See note [reducible non-instances]
abbrev CoheytingAlgebra.ofHNot [DistribLattice α] [BoundedOrder α] (hnot : α → α)
(sdiff_le_iff : ∀ a b c, a ⊓ hnot b ≤ c ↔ a ≤ b ⊔ c) : CoheytingAlgebra α where
sdiff a b := a ⊓ hnot b
hnot := hnot
sdiff_le_iff := sdiff_le_iff
top_sdiff _ := top_inf_eq _
#align coheyting_algebra.of_hnot CoheytingAlgebra.ofHNot
section GeneralizedCoheytingAlgebra
variable [GeneralizedCoheytingAlgebra α] {a b c d : α}
@[simp]
theorem sdiff_le_iff : a \ b ≤ c ↔ a ≤ b ⊔ c :=
GeneralizedCoheytingAlgebra.sdiff_le_iff _ _ _
#align sdiff_le_iff sdiff_le_iff
theorem sdiff_le_iff' : a \ b ≤ c ↔ a ≤ c ⊔ b := by rw [sdiff_le_iff, sup_comm]
#align sdiff_le_iff' sdiff_le_iff'
theorem sdiff_le_comm : a \ b ≤ c ↔ a \ c ≤ b := by rw [sdiff_le_iff, sdiff_le_iff']
#align sdiff_le_comm sdiff_le_comm
theorem sdiff_le : a \ b ≤ a :=
sdiff_le_iff.2 le_sup_right
#align sdiff_le sdiff_le
theorem Disjoint.disjoint_sdiff_left (h : Disjoint a b) : Disjoint (a \ c) b :=
h.mono_left sdiff_le
#align disjoint.disjoint_sdiff_left Disjoint.disjoint_sdiff_left
theorem Disjoint.disjoint_sdiff_right (h : Disjoint a b) : Disjoint a (b \ c) :=
h.mono_right sdiff_le
#align disjoint.disjoint_sdiff_right Disjoint.disjoint_sdiff_right
theorem sdiff_le_iff_left : a \ b ≤ b ↔ a ≤ b := by rw [sdiff_le_iff, sup_idem]
#align sdiff_le_iff_left sdiff_le_iff_left
@[simp]
theorem sdiff_self : a \ a = ⊥ :=
le_bot_iff.1 <| sdiff_le_iff.2 le_sup_left
#align sdiff_self sdiff_self
theorem le_sup_sdiff : a ≤ b ⊔ a \ b :=
sdiff_le_iff.1 le_rfl
#align le_sup_sdiff le_sup_sdiff
theorem le_sdiff_sup : a ≤ a \ b ⊔ b := by rw [sup_comm, ← sdiff_le_iff]
#align le_sdiff_sup le_sdiff_sup
theorem sup_sdiff_left : a ⊔ a \ b = a :=
sup_of_le_left sdiff_le
#align sup_sdiff_left sup_sdiff_left
theorem sup_sdiff_right : a \ b ⊔ a = a :=
sup_of_le_right sdiff_le
#align sup_sdiff_right sup_sdiff_right
theorem inf_sdiff_left : a \ b ⊓ a = a \ b :=
inf_of_le_left sdiff_le
#align inf_sdiff_left inf_sdiff_left
theorem inf_sdiff_right : a ⊓ a \ b = a \ b :=
inf_of_le_right sdiff_le
#align inf_sdiff_right inf_sdiff_right
@[simp]
theorem sup_sdiff_self (a b : α) : a ⊔ b \ a = a ⊔ b :=
le_antisymm (sup_le_sup_left sdiff_le _) (sup_le le_sup_left le_sup_sdiff)
#align sup_sdiff_self sup_sdiff_self
@[simp]
theorem sdiff_sup_self (a b : α) : b \ a ⊔ a = b ⊔ a := by rw [sup_comm, sup_sdiff_self, sup_comm]
#align sdiff_sup_self sdiff_sup_self
alias sup_sdiff_self_left := sdiff_sup_self
#align sup_sdiff_self_left sup_sdiff_self_left
alias sup_sdiff_self_right := sup_sdiff_self
#align sup_sdiff_self_right sup_sdiff_self_right
theorem sup_sdiff_eq_sup (h : c ≤ a) : a ⊔ b \ c = a ⊔ b :=
sup_congr_left (sdiff_le.trans le_sup_right) <| le_sup_sdiff.trans <| sup_le_sup_right h _
#align sup_sdiff_eq_sup sup_sdiff_eq_sup
-- cf. `Set.union_diff_cancel'`
theorem sup_sdiff_cancel' (hab : a ≤ b) (hbc : b ≤ c) : b ⊔ c \ a = c := by
rw [sup_sdiff_eq_sup hab, sup_of_le_right hbc]
#align sup_sdiff_cancel' sup_sdiff_cancel'
theorem sup_sdiff_cancel_right (h : a ≤ b) : a ⊔ b \ a = b :=
sup_sdiff_cancel' le_rfl h
#align sup_sdiff_cancel_right sup_sdiff_cancel_right
theorem sdiff_sup_cancel (h : b ≤ a) : a \ b ⊔ b = a := by rw [sup_comm, sup_sdiff_cancel_right h]
#align sdiff_sup_cancel sdiff_sup_cancel
theorem sup_le_of_le_sdiff_left (h : b ≤ c \ a) (hac : a ≤ c) : a ⊔ b ≤ c :=
sup_le hac <| h.trans sdiff_le
#align sup_le_of_le_sdiff_left sup_le_of_le_sdiff_left
theorem sup_le_of_le_sdiff_right (h : a ≤ c \ b) (hbc : b ≤ c) : a ⊔ b ≤ c :=
sup_le (h.trans sdiff_le) hbc
#align sup_le_of_le_sdiff_right sup_le_of_le_sdiff_right
@[simp]
theorem sdiff_eq_bot_iff : a \ b = ⊥ ↔ a ≤ b := by rw [← le_bot_iff, sdiff_le_iff, sup_bot_eq]
#align sdiff_eq_bot_iff sdiff_eq_bot_iff
@[simp]
theorem sdiff_bot : a \ ⊥ = a :=
eq_of_forall_ge_iff fun b => by rw [sdiff_le_iff, bot_sup_eq]
#align sdiff_bot sdiff_bot
@[simp]
theorem bot_sdiff : ⊥ \ a = ⊥ :=
sdiff_eq_bot_iff.2 bot_le
#align bot_sdiff bot_sdiff
theorem sdiff_sdiff_sdiff_le_sdiff : (a \ b) \ (a \ c) ≤ c \ b := by
rw [sdiff_le_iff, sdiff_le_iff, sup_left_comm, sup_sdiff_self, sup_left_comm, sdiff_sup_self,
sup_left_comm]
exact le_sup_left
#align sdiff_sdiff_sdiff_le_sdiff sdiff_sdiff_sdiff_le_sdiff
@[simp]
theorem le_sup_sdiff_sup_sdiff : a ≤ b ⊔ (a \ c ⊔ c \ b) := by
simpa using @sdiff_sdiff_sdiff_le_sdiff
theorem sdiff_sdiff (a b c : α) : (a \ b) \ c = a \ (b ⊔ c) :=
eq_of_forall_ge_iff fun d => by simp_rw [sdiff_le_iff, sup_assoc]
#align sdiff_sdiff sdiff_sdiff
theorem sdiff_sdiff_left : (a \ b) \ c = a \ (b ⊔ c) :=
sdiff_sdiff _ _ _
#align sdiff_sdiff_left sdiff_sdiff_left
theorem sdiff_right_comm (a b c : α) : (a \ b) \ c = (a \ c) \ b := by
simp_rw [sdiff_sdiff, sup_comm]
#align sdiff_right_comm sdiff_right_comm
theorem sdiff_sdiff_comm : (a \ b) \ c = (a \ c) \ b :=
sdiff_right_comm _ _ _
#align sdiff_sdiff_comm sdiff_sdiff_comm
@[simp]
theorem sdiff_idem : (a \ b) \ b = a \ b := by rw [sdiff_sdiff_left, sup_idem]
#align sdiff_idem sdiff_idem
@[simp]
theorem sdiff_sdiff_self : (a \ b) \ a = ⊥ := by rw [sdiff_sdiff_comm, sdiff_self, bot_sdiff]
#align sdiff_sdiff_self sdiff_sdiff_self
theorem sup_sdiff_distrib (a b c : α) : (a ⊔ b) \ c = a \ c ⊔ b \ c :=
eq_of_forall_ge_iff fun d => by simp_rw [sdiff_le_iff, sup_le_iff, sdiff_le_iff]
#align sup_sdiff_distrib sup_sdiff_distrib
theorem sdiff_inf_distrib (a b c : α) : a \ (b ⊓ c) = a \ b ⊔ a \ c :=
eq_of_forall_ge_iff fun d => by
rw [sup_le_iff, sdiff_le_comm, le_inf_iff]
simp_rw [sdiff_le_comm]
#align sdiff_inf_distrib sdiff_inf_distrib
theorem sup_sdiff : (a ⊔ b) \ c = a \ c ⊔ b \ c :=
sup_sdiff_distrib _ _ _
#align sup_sdiff sup_sdiff
@[simp]
theorem sup_sdiff_right_self : (a ⊔ b) \ b = a \ b := by rw [sup_sdiff, sdiff_self, sup_bot_eq]
#align sup_sdiff_right_self sup_sdiff_right_self
@[simp]
theorem sup_sdiff_left_self : (a ⊔ b) \ a = b \ a := by rw [sup_comm, sup_sdiff_right_self]
#align sup_sdiff_left_self sup_sdiff_left_self
@[gcongr]
theorem sdiff_le_sdiff_right (h : a ≤ b) : a \ c ≤ b \ c :=
sdiff_le_iff.2 <| h.trans <| le_sup_sdiff
#align sdiff_le_sdiff_right sdiff_le_sdiff_right
@[gcongr]
theorem sdiff_le_sdiff_left (h : a ≤ b) : c \ b ≤ c \ a :=
sdiff_le_iff.2 <| le_sup_sdiff.trans <| sup_le_sup_right h _
#align sdiff_le_sdiff_left sdiff_le_sdiff_left
@[gcongr]
theorem sdiff_le_sdiff (hab : a ≤ b) (hcd : c ≤ d) : a \ d ≤ b \ c :=
(sdiff_le_sdiff_right hab).trans <| sdiff_le_sdiff_left hcd
#align sdiff_le_sdiff sdiff_le_sdiff
-- cf. `IsCompl.inf_sup`
theorem sdiff_inf : a \ (b ⊓ c) = a \ b ⊔ a \ c :=
sdiff_inf_distrib _ _ _
#align sdiff_inf sdiff_inf
@[simp]
theorem sdiff_inf_self_left (a b : α) : a \ (a ⊓ b) = a \ b := by
rw [sdiff_inf, sdiff_self, bot_sup_eq]
#align sdiff_inf_self_left sdiff_inf_self_left
@[simp]
theorem sdiff_inf_self_right (a b : α) : b \ (a ⊓ b) = b \ a := by
rw [sdiff_inf, sdiff_self, sup_bot_eq]
#align sdiff_inf_self_right sdiff_inf_self_right
theorem Disjoint.sdiff_eq_left (h : Disjoint a b) : a \ b = a := by
conv_rhs => rw [← @sdiff_bot _ _ a]
rw [← h.eq_bot, sdiff_inf_self_left]
#align disjoint.sdiff_eq_left Disjoint.sdiff_eq_left
theorem Disjoint.sdiff_eq_right (h : Disjoint a b) : b \ a = b :=
h.symm.sdiff_eq_left
#align disjoint.sdiff_eq_right Disjoint.sdiff_eq_right
| Mathlib/Order/Heyting/Basic.lean | 641 | 642 | theorem Disjoint.sup_sdiff_cancel_left (h : Disjoint a b) : (a ⊔ b) \ a = b := by |
rw [sup_sdiff, sdiff_self, bot_sup_eq, h.sdiff_eq_right]
|
import Mathlib.Topology.Order.Basic
open Set Filter OrderDual
open scoped Topology
section OrderClosedTopology
variable {α : Type*} [LinearOrder α] [TopologicalSpace α] [OrderClosedTopology α] {a b c d : α}
@[simp] theorem nhdsSet_Ioi : 𝓝ˢ (Ioi a) = 𝓟 (Ioi a) := isOpen_Ioi.nhdsSet_eq
@[simp] theorem nhdsSet_Iio : 𝓝ˢ (Iio a) = 𝓟 (Iio a) := isOpen_Iio.nhdsSet_eq
@[simp] theorem nhdsSet_Ioo : 𝓝ˢ (Ioo a b) = 𝓟 (Ioo a b) := isOpen_Ioo.nhdsSet_eq
theorem nhdsSet_Ici : 𝓝ˢ (Ici a) = 𝓝 a ⊔ 𝓟 (Ioi a) := by
rw [← Ioi_insert, nhdsSet_insert, nhdsSet_Ioi]
theorem nhdsSet_Iic : 𝓝ˢ (Iic a) = 𝓝 a ⊔ 𝓟 (Iio a) := nhdsSet_Ici (α := αᵒᵈ)
| Mathlib/Topology/Order/NhdsSet.lean | 41 | 42 | theorem nhdsSet_Ico (h : a < b) : 𝓝ˢ (Ico a b) = 𝓝 a ⊔ 𝓟 (Ioo a b) := by |
rw [← Ioo_insert_left h, nhdsSet_insert, nhdsSet_Ioo]
|
import Mathlib.Data.Num.Lemmas
import Mathlib.Data.Nat.Prime
import Mathlib.Tactic.Ring
#align_import data.num.prime from "leanprover-community/mathlib"@"58581d0fe523063f5651df0619be2bf65012a94a"
namespace PosNum
def minFacAux (n : PosNum) : ℕ → PosNum → PosNum
| 0, _ => n
| fuel + 1, k =>
if n < k.bit1 * k.bit1 then n else if k.bit1 ∣ n then k.bit1 else minFacAux n fuel k.succ
#align pos_num.min_fac_aux PosNum.minFacAux
set_option linter.deprecated false in
theorem minFacAux_to_nat {fuel : ℕ} {n k : PosNum} (h : Nat.sqrt n < fuel + k.bit1) :
(minFacAux n fuel k : ℕ) = Nat.minFacAux n k.bit1 := by
induction' fuel with fuel ih generalizing k <;> rw [minFacAux, Nat.minFacAux]
· rw [Nat.zero_add, Nat.sqrt_lt] at h
simp only [h, ite_true]
simp_rw [← mul_to_nat]
simp only [cast_lt, dvd_to_nat]
split_ifs <;> try rfl
rw [ih] <;> [congr; convert Nat.lt_succ_of_lt h using 1] <;>
simp only [_root_.bit1, _root_.bit0, cast_bit1, cast_succ, Nat.succ_eq_add_one, add_assoc,
add_left_comm, ← one_add_one_eq_two]
#align pos_num.min_fac_aux_to_nat PosNum.minFacAux_to_nat
def minFac : PosNum → PosNum
| 1 => 1
| bit0 _ => 2
| bit1 n => minFacAux (bit1 n) n 1
#align pos_num.min_fac PosNum.minFac
@[simp]
| Mathlib/Data/Num/Prime.lean | 65 | 83 | theorem minFac_to_nat (n : PosNum) : (minFac n : ℕ) = Nat.minFac n := by |
cases' n with n
· rfl
· rw [minFac, Nat.minFac_eq, if_neg]
swap
· simp
rw [minFacAux_to_nat]
· rfl
simp only [cast_one, cast_bit1]
unfold _root_.bit1 _root_.bit0
rw [Nat.sqrt_lt]
calc
(n : ℕ) + (n : ℕ) + 1 ≤ (n : ℕ) + (n : ℕ) + (n : ℕ) := by simp
_ = (n : ℕ) * (1 + 1 + 1) := by simp only [mul_add, mul_one]
_ < _ := by
set_option simprocs false in simp [mul_lt_mul]
· rw [minFac, Nat.minFac_eq, if_pos]
· rfl
simp
|
import Mathlib.Analysis.Calculus.Deriv.Mul
import Mathlib.Analysis.Calculus.Deriv.Comp
#align_import analysis.calculus.deriv.inv from "leanprover-community/mathlib"@"3bce8d800a6f2b8f63fe1e588fd76a9ff4adcebe"
universe u v w
open scoped Classical
open Topology Filter ENNReal
open Filter Asymptotics Set
open ContinuousLinearMap (smulRight smulRight_one_eq_iff)
variable {𝕜 : Type u} [NontriviallyNormedField 𝕜]
variable {F : Type v} [NormedAddCommGroup F] [NormedSpace 𝕜 F]
variable {E : Type w} [NormedAddCommGroup E] [NormedSpace 𝕜 E]
variable {f f₀ f₁ g : 𝕜 → F}
variable {f' f₀' f₁' g' : F}
variable {x : 𝕜}
variable {s t : Set 𝕜}
variable {L : Filter 𝕜}
section Inverse
theorem hasStrictDerivAt_inv (hx : x ≠ 0) : HasStrictDerivAt Inv.inv (-(x ^ 2)⁻¹) x := by
suffices
(fun p : 𝕜 × 𝕜 => (p.1 - p.2) * ((x * x)⁻¹ - (p.1 * p.2)⁻¹)) =o[𝓝 (x, x)] fun p =>
(p.1 - p.2) * 1 by
refine this.congr' ?_ (eventually_of_forall fun _ => mul_one _)
refine Eventually.mono ((isOpen_ne.prod isOpen_ne).mem_nhds ⟨hx, hx⟩) ?_
rintro ⟨y, z⟩ ⟨hy, hz⟩
simp only [mem_setOf_eq] at hy hz
-- hy : y ≠ 0, hz : z ≠ 0
field_simp [hx, hy, hz]
ring
refine (isBigO_refl (fun p : 𝕜 × 𝕜 => p.1 - p.2) _).mul_isLittleO ((isLittleO_one_iff 𝕜).2 ?_)
rw [← sub_self (x * x)⁻¹]
exact tendsto_const_nhds.sub ((continuous_mul.tendsto (x, x)).inv₀ <| mul_ne_zero hx hx)
#align has_strict_deriv_at_inv hasStrictDerivAt_inv
theorem hasDerivAt_inv (x_ne_zero : x ≠ 0) : HasDerivAt (fun y => y⁻¹) (-(x ^ 2)⁻¹) x :=
(hasStrictDerivAt_inv x_ne_zero).hasDerivAt
#align has_deriv_at_inv hasDerivAt_inv
theorem hasDerivWithinAt_inv (x_ne_zero : x ≠ 0) (s : Set 𝕜) :
HasDerivWithinAt (fun x => x⁻¹) (-(x ^ 2)⁻¹) s x :=
(hasDerivAt_inv x_ne_zero).hasDerivWithinAt
#align has_deriv_within_at_inv hasDerivWithinAt_inv
theorem differentiableAt_inv : DifferentiableAt 𝕜 (fun x => x⁻¹) x ↔ x ≠ 0 :=
⟨fun H => NormedField.continuousAt_inv.1 H.continuousAt, fun H =>
(hasDerivAt_inv H).differentiableAt⟩
#align differentiable_at_inv differentiableAt_inv
theorem differentiableWithinAt_inv (x_ne_zero : x ≠ 0) :
DifferentiableWithinAt 𝕜 (fun x => x⁻¹) s x :=
(differentiableAt_inv.2 x_ne_zero).differentiableWithinAt
#align differentiable_within_at_inv differentiableWithinAt_inv
theorem differentiableOn_inv : DifferentiableOn 𝕜 (fun x : 𝕜 => x⁻¹) { x | x ≠ 0 } := fun _x hx =>
differentiableWithinAt_inv hx
#align differentiable_on_inv differentiableOn_inv
theorem deriv_inv : deriv (fun x => x⁻¹) x = -(x ^ 2)⁻¹ := by
rcases eq_or_ne x 0 with (rfl | hne)
· simp [deriv_zero_of_not_differentiableAt (mt differentiableAt_inv.1 (not_not.2 rfl))]
· exact (hasDerivAt_inv hne).deriv
#align deriv_inv deriv_inv
@[simp]
theorem deriv_inv' : (deriv fun x : 𝕜 => x⁻¹) = fun x => -(x ^ 2)⁻¹ :=
funext fun _ => deriv_inv
#align deriv_inv' deriv_inv'
theorem derivWithin_inv (x_ne_zero : x ≠ 0) (hxs : UniqueDiffWithinAt 𝕜 s x) :
derivWithin (fun x => x⁻¹) s x = -(x ^ 2)⁻¹ := by
rw [DifferentiableAt.derivWithin (differentiableAt_inv.2 x_ne_zero) hxs]
exact deriv_inv
#align deriv_within_inv derivWithin_inv
theorem hasFDerivAt_inv (x_ne_zero : x ≠ 0) :
HasFDerivAt (fun x => x⁻¹) (smulRight (1 : 𝕜 →L[𝕜] 𝕜) (-(x ^ 2)⁻¹) : 𝕜 →L[𝕜] 𝕜) x :=
hasDerivAt_inv x_ne_zero
#align has_fderiv_at_inv hasFDerivAt_inv
theorem hasFDerivWithinAt_inv (x_ne_zero : x ≠ 0) :
HasFDerivWithinAt (fun x => x⁻¹) (smulRight (1 : 𝕜 →L[𝕜] 𝕜) (-(x ^ 2)⁻¹) : 𝕜 →L[𝕜] 𝕜) s x :=
(hasFDerivAt_inv x_ne_zero).hasFDerivWithinAt
#align has_fderiv_within_at_inv hasFDerivWithinAt_inv
theorem fderiv_inv : fderiv 𝕜 (fun x => x⁻¹) x = smulRight (1 : 𝕜 →L[𝕜] 𝕜) (-(x ^ 2)⁻¹) := by
rw [← deriv_fderiv, deriv_inv]
#align fderiv_inv fderiv_inv
| Mathlib/Analysis/Calculus/Deriv/Inv.lean | 118 | 121 | theorem fderivWithin_inv (x_ne_zero : x ≠ 0) (hxs : UniqueDiffWithinAt 𝕜 s x) :
fderivWithin 𝕜 (fun x => x⁻¹) s x = smulRight (1 : 𝕜 →L[𝕜] 𝕜) (-(x ^ 2)⁻¹) := by |
rw [DifferentiableAt.fderivWithin (differentiableAt_inv.2 x_ne_zero) hxs]
exact fderiv_inv
|
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}
| Mathlib/MeasureTheory/Function/Jacobian.lean | 109 | 243 | 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 |
/- Choose countably many linear maps `f' z`. For every such map, if `f` has a derivative at `x`
close enough to `f' z`, then `f y - f x` is well approximated by `f' z (y - x)` for `y` close
enough to `x`, say on a ball of radius `r` (or even `u n` for some `n`, where `u` is a fixed
sequence tending to `0`).
Let `M n z` be the points where this happens. Then this set is relatively closed inside `s`,
and moreover in every closed ball of radius `u n / 3` inside it the map is well approximated by
`f' z`. Using countably many closed balls to split `M n z` into small diameter subsets
`K n z p`, one obtains the desired sets `t q` after reindexing.
-/
-- 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
|
import Mathlib.MeasureTheory.Group.Action
import Mathlib.MeasureTheory.Integral.SetIntegral
import Mathlib.MeasureTheory.Group.Pointwise
#align_import measure_theory.group.fundamental_domain from "leanprover-community/mathlib"@"3b52265189f3fb43aa631edffce5d060fafaf82f"
open scoped ENNReal Pointwise Topology NNReal ENNReal MeasureTheory
open MeasureTheory MeasureTheory.Measure Set Function TopologicalSpace Filter
namespace MeasureTheory
structure IsAddFundamentalDomain (G : Type*) {α : Type*} [Zero G] [VAdd G α] [MeasurableSpace α]
(s : Set α) (μ : Measure α := by volume_tac) : Prop where
protected nullMeasurableSet : NullMeasurableSet s μ
protected ae_covers : ∀ᵐ x ∂μ, ∃ g : G, g +ᵥ x ∈ s
protected aedisjoint : Pairwise <| (AEDisjoint μ on fun g : G => g +ᵥ s)
#align measure_theory.is_add_fundamental_domain MeasureTheory.IsAddFundamentalDomain
@[to_additive IsAddFundamentalDomain]
structure IsFundamentalDomain (G : Type*) {α : Type*} [One G] [SMul G α] [MeasurableSpace α]
(s : Set α) (μ : Measure α := by volume_tac) : Prop where
protected nullMeasurableSet : NullMeasurableSet s μ
protected ae_covers : ∀ᵐ x ∂μ, ∃ g : G, g • x ∈ s
protected aedisjoint : Pairwise <| (AEDisjoint μ on fun g : G => g • s)
#align measure_theory.is_fundamental_domain MeasureTheory.IsFundamentalDomain
variable {G H α β E : Type*}
namespace IsFundamentalDomain
variable [Group G] [Group H] [MulAction G α] [MeasurableSpace α] [MulAction H β] [MeasurableSpace β]
[NormedAddCommGroup E] {s t : Set α} {μ : Measure α}
@[to_additive "If for each `x : α`, exactly one of `g +ᵥ x`, `g : G`, belongs to a measurable set
`s`, then `s` is a fundamental domain for the additive action of `G` on `α`."]
theorem mk' (h_meas : NullMeasurableSet s μ) (h_exists : ∀ x : α, ∃! g : G, g • x ∈ s) :
IsFundamentalDomain G s μ where
nullMeasurableSet := h_meas
ae_covers := eventually_of_forall fun x => (h_exists x).exists
aedisjoint a b hab := Disjoint.aedisjoint <| disjoint_left.2 fun x hxa hxb => by
rw [mem_smul_set_iff_inv_smul_mem] at hxa hxb
exact hab (inv_injective <| (h_exists x).unique hxa hxb)
#align measure_theory.is_fundamental_domain.mk' MeasureTheory.IsFundamentalDomain.mk'
#align measure_theory.is_add_fundamental_domain.mk' MeasureTheory.IsAddFundamentalDomain.mk'
@[to_additive "For `s` to be a fundamental domain, it's enough to check
`MeasureTheory.AEDisjoint (g +ᵥ s) s` for `g ≠ 0`."]
theorem mk'' (h_meas : NullMeasurableSet s μ) (h_ae_covers : ∀ᵐ x ∂μ, ∃ g : G, g • x ∈ s)
(h_ae_disjoint : ∀ g, g ≠ (1 : G) → AEDisjoint μ (g • s) s)
(h_qmp : ∀ g : G, QuasiMeasurePreserving ((g • ·) : α → α) μ μ) :
IsFundamentalDomain G s μ where
nullMeasurableSet := h_meas
ae_covers := h_ae_covers
aedisjoint := pairwise_aedisjoint_of_aedisjoint_forall_ne_one h_ae_disjoint h_qmp
#align measure_theory.is_fundamental_domain.mk'' MeasureTheory.IsFundamentalDomain.mk''
#align measure_theory.is_add_fundamental_domain.mk'' MeasureTheory.IsAddFundamentalDomain.mk''
@[to_additive
"If a measurable space has a finite measure `μ` and a countable additive group `G` acts
quasi-measure-preservingly, then to show that a set `s` is a fundamental domain, it is sufficient
to check that its translates `g +ᵥ s` are (almost) disjoint and that the sum `∑' g, μ (g +ᵥ s)` is
sufficiently large."]
theorem mk_of_measure_univ_le [IsFiniteMeasure μ] [Countable G] (h_meas : NullMeasurableSet s μ)
(h_ae_disjoint : ∀ g ≠ (1 : G), AEDisjoint μ (g • s) s)
(h_qmp : ∀ g : G, QuasiMeasurePreserving (g • · : α → α) μ μ)
(h_measure_univ_le : μ (univ : Set α) ≤ ∑' g : G, μ (g • s)) : IsFundamentalDomain G s μ :=
have aedisjoint : Pairwise (AEDisjoint μ on fun g : G => g • s) :=
pairwise_aedisjoint_of_aedisjoint_forall_ne_one h_ae_disjoint h_qmp
{ nullMeasurableSet := h_meas
aedisjoint
ae_covers := by
replace h_meas : ∀ g : G, NullMeasurableSet (g • s) μ := fun g => by
rw [← inv_inv g, ← preimage_smul]; exact h_meas.preimage (h_qmp g⁻¹)
have h_meas' : NullMeasurableSet {a | ∃ g : G, g • a ∈ s} μ := by
rw [← iUnion_smul_eq_setOf_exists]; exact .iUnion h_meas
rw [ae_iff_measure_eq h_meas', ← iUnion_smul_eq_setOf_exists]
refine le_antisymm (measure_mono <| subset_univ _) ?_
rw [measure_iUnion₀ aedisjoint h_meas]
exact h_measure_univ_le }
#align measure_theory.is_fundamental_domain.mk_of_measure_univ_le MeasureTheory.IsFundamentalDomain.mk_of_measure_univ_le
#align measure_theory.is_add_fundamental_domain.mk_of_measure_univ_le MeasureTheory.IsAddFundamentalDomain.mk_of_measure_univ_le
@[to_additive]
theorem iUnion_smul_ae_eq (h : IsFundamentalDomain G s μ) : ⋃ g : G, g • s =ᵐ[μ] univ :=
eventuallyEq_univ.2 <| h.ae_covers.mono fun _ ⟨g, hg⟩ =>
mem_iUnion.2 ⟨g⁻¹, _, hg, inv_smul_smul _ _⟩
#align measure_theory.is_fundamental_domain.Union_smul_ae_eq MeasureTheory.IsFundamentalDomain.iUnion_smul_ae_eq
#align measure_theory.is_add_fundamental_domain.Union_vadd_ae_eq MeasureTheory.IsAddFundamentalDomain.iUnion_vadd_ae_eq
@[to_additive]
theorem measure_ne_zero [MeasurableSpace G] [Countable G] [MeasurableSMul G α]
[SMulInvariantMeasure G α μ] (hμ : μ ≠ 0) (h : IsFundamentalDomain G s μ) :
μ s ≠ 0 := by
have hc := measure_univ_pos.mpr hμ
contrapose! hc
rw [← measure_congr h.iUnion_smul_ae_eq]
refine le_trans (measure_iUnion_le _) ?_
simp_rw [measure_smul, hc, tsum_zero, le_refl]
@[to_additive]
theorem mono (h : IsFundamentalDomain G s μ) {ν : Measure α} (hle : ν ≪ μ) :
IsFundamentalDomain G s ν :=
⟨h.1.mono_ac hle, hle h.2, h.aedisjoint.mono fun _ _ h => hle h⟩
#align measure_theory.is_fundamental_domain.mono MeasureTheory.IsFundamentalDomain.mono
#align measure_theory.is_add_fundamental_domain.mono MeasureTheory.IsAddFundamentalDomain.mono
@[to_additive]
theorem preimage_of_equiv {ν : Measure β} (h : IsFundamentalDomain G s μ) {f : β → α}
(hf : QuasiMeasurePreserving f ν μ) {e : G → H} (he : Bijective e)
(hef : ∀ g, Semiconj f (e g • ·) (g • ·)) : IsFundamentalDomain H (f ⁻¹' s) ν where
nullMeasurableSet := h.nullMeasurableSet.preimage hf
ae_covers := (hf.ae h.ae_covers).mono fun x ⟨g, hg⟩ => ⟨e g, by rwa [mem_preimage, hef g x]⟩
aedisjoint a b hab := by
lift e to G ≃ H using he
have : (e.symm a⁻¹)⁻¹ ≠ (e.symm b⁻¹)⁻¹ := by simp [hab]
have := (h.aedisjoint this).preimage hf
simp only [Semiconj] at hef
simpa only [onFun, ← preimage_smul_inv, preimage_preimage, ← hef, e.apply_symm_apply, inv_inv]
using this
#align measure_theory.is_fundamental_domain.preimage_of_equiv MeasureTheory.IsFundamentalDomain.preimage_of_equiv
#align measure_theory.is_add_fundamental_domain.preimage_of_equiv MeasureTheory.IsAddFundamentalDomain.preimage_of_equiv
@[to_additive]
theorem image_of_equiv {ν : Measure β} (h : IsFundamentalDomain G s μ) (f : α ≃ β)
(hf : QuasiMeasurePreserving f.symm ν μ) (e : H ≃ G)
(hef : ∀ g, Semiconj f (e g • ·) (g • ·)) : IsFundamentalDomain H (f '' s) ν := by
rw [f.image_eq_preimage]
refine h.preimage_of_equiv hf e.symm.bijective fun g x => ?_
rcases f.surjective x with ⟨x, rfl⟩
rw [← hef _ _, f.symm_apply_apply, f.symm_apply_apply, e.apply_symm_apply]
#align measure_theory.is_fundamental_domain.image_of_equiv MeasureTheory.IsFundamentalDomain.image_of_equiv
#align measure_theory.is_add_fundamental_domain.image_of_equiv MeasureTheory.IsAddFundamentalDomain.image_of_equiv
@[to_additive]
theorem pairwise_aedisjoint_of_ac {ν} (h : IsFundamentalDomain G s μ) (hν : ν ≪ μ) :
Pairwise fun g₁ g₂ : G => AEDisjoint ν (g₁ • s) (g₂ • s) :=
h.aedisjoint.mono fun _ _ H => hν H
#align measure_theory.is_fundamental_domain.pairwise_ae_disjoint_of_ac MeasureTheory.IsFundamentalDomain.pairwise_aedisjoint_of_ac
#align measure_theory.is_add_fundamental_domain.pairwise_ae_disjoint_of_ac MeasureTheory.IsAddFundamentalDomain.pairwise_aedisjoint_of_ac
@[to_additive]
theorem smul_of_comm {G' : Type*} [Group G'] [MulAction G' α] [MeasurableSpace G']
[MeasurableSMul G' α] [SMulInvariantMeasure G' α μ] [SMulCommClass G' G α]
(h : IsFundamentalDomain G s μ) (g : G') : IsFundamentalDomain G (g • s) μ :=
h.image_of_equiv (MulAction.toPerm g) (measurePreserving_smul _ _).quasiMeasurePreserving
(Equiv.refl _) <| smul_comm g
#align measure_theory.is_fundamental_domain.smul_of_comm MeasureTheory.IsFundamentalDomain.smul_of_comm
#align measure_theory.is_add_fundamental_domain.vadd_of_comm MeasureTheory.IsAddFundamentalDomain.vadd_of_comm
variable [MeasurableSpace G] [MeasurableSMul G α] [SMulInvariantMeasure G α μ]
@[to_additive]
theorem nullMeasurableSet_smul (h : IsFundamentalDomain G s μ) (g : G) :
NullMeasurableSet (g • s) μ :=
h.nullMeasurableSet.smul g
#align measure_theory.is_fundamental_domain.null_measurable_set_smul MeasureTheory.IsFundamentalDomain.nullMeasurableSet_smul
#align measure_theory.is_add_fundamental_domain.null_measurable_set_vadd MeasureTheory.IsAddFundamentalDomain.nullMeasurableSet_vadd
@[to_additive]
theorem restrict_restrict (h : IsFundamentalDomain G s μ) (g : G) (t : Set α) :
(μ.restrict t).restrict (g • s) = μ.restrict (g • s ∩ t) :=
restrict_restrict₀ ((h.nullMeasurableSet_smul g).mono restrict_le_self)
#align measure_theory.is_fundamental_domain.restrict_restrict MeasureTheory.IsFundamentalDomain.restrict_restrict
#align measure_theory.is_add_fundamental_domain.restrict_restrict MeasureTheory.IsAddFundamentalDomain.restrict_restrict
@[to_additive]
theorem smul (h : IsFundamentalDomain G s μ) (g : G) : IsFundamentalDomain G (g • s) μ :=
h.image_of_equiv (MulAction.toPerm g) (measurePreserving_smul _ _).quasiMeasurePreserving
⟨fun g' => g⁻¹ * g' * g, fun g' => g * g' * g⁻¹, fun g' => by simp [mul_assoc], fun g' => by
simp [mul_assoc]⟩
fun g' x => by simp [smul_smul, mul_assoc]
#align measure_theory.is_fundamental_domain.smul MeasureTheory.IsFundamentalDomain.smul
#align measure_theory.is_add_fundamental_domain.vadd MeasureTheory.IsAddFundamentalDomain.vadd
variable [Countable G] {ν : Measure α}
@[to_additive]
| Mathlib/MeasureTheory/Group/FundamentalDomain.lean | 236 | 240 | theorem sum_restrict_of_ac (h : IsFundamentalDomain G s μ) (hν : ν ≪ μ) :
(sum fun g : G => ν.restrict (g • s)) = ν := by |
rw [← restrict_iUnion_ae (h.aedisjoint.mono fun i j h => hν h) fun g =>
(h.nullMeasurableSet_smul g).mono_ac hν,
restrict_congr_set (hν h.iUnion_smul_ae_eq), restrict_univ]
|
import Mathlib.CategoryTheory.Subobject.Lattice
#align_import category_theory.subobject.limits from "leanprover-community/mathlib"@"956af7c76589f444f2e1313911bad16366ea476d"
universe v u
noncomputable section
open CategoryTheory CategoryTheory.Category CategoryTheory.Limits CategoryTheory.Subobject Opposite
variable {C : Type u} [Category.{v} C] {X Y Z : C}
namespace CategoryTheory
namespace Limits
section Image
variable (f : X ⟶ Y) [HasImage f]
abbrev imageSubobject : Subobject Y :=
Subobject.mk (image.ι f)
#align category_theory.limits.image_subobject CategoryTheory.Limits.imageSubobject
def imageSubobjectIso : (imageSubobject f : C) ≅ image f :=
Subobject.underlyingIso (image.ι f)
#align category_theory.limits.image_subobject_iso CategoryTheory.Limits.imageSubobjectIso
@[reassoc (attr := simp)]
theorem imageSubobject_arrow :
(imageSubobjectIso f).hom ≫ image.ι f = (imageSubobject f).arrow := by simp [imageSubobjectIso]
#align category_theory.limits.image_subobject_arrow CategoryTheory.Limits.imageSubobject_arrow
@[reassoc (attr := simp)]
theorem imageSubobject_arrow' :
(imageSubobjectIso f).inv ≫ (imageSubobject f).arrow = image.ι f := by simp [imageSubobjectIso]
#align category_theory.limits.image_subobject_arrow' CategoryTheory.Limits.imageSubobject_arrow'
def factorThruImageSubobject : X ⟶ imageSubobject f :=
factorThruImage f ≫ (imageSubobjectIso f).inv
#align category_theory.limits.factor_thru_image_subobject CategoryTheory.Limits.factorThruImageSubobject
instance [HasEqualizers C] : Epi (factorThruImageSubobject f) := by
dsimp [factorThruImageSubobject]
apply epi_comp
@[reassoc (attr := simp), elementwise (attr := simp)]
theorem imageSubobject_arrow_comp : factorThruImageSubobject f ≫ (imageSubobject f).arrow = f := by
simp [factorThruImageSubobject, imageSubobject_arrow]
#align category_theory.limits.image_subobject_arrow_comp CategoryTheory.Limits.imageSubobject_arrow_comp
theorem imageSubobject_arrow_comp_eq_zero [HasZeroMorphisms C] {X Y Z : C} {f : X ⟶ Y} {g : Y ⟶ Z}
[HasImage f] [Epi (factorThruImageSubobject f)] (h : f ≫ g = 0) :
(imageSubobject f).arrow ≫ g = 0 :=
zero_of_epi_comp (factorThruImageSubobject f) <| by simp [h]
#align category_theory.limits.image_subobject_arrow_comp_eq_zero CategoryTheory.Limits.imageSubobject_arrow_comp_eq_zero
theorem imageSubobject_factors_comp_self {W : C} (k : W ⟶ X) : (imageSubobject f).Factors (k ≫ f) :=
⟨k ≫ factorThruImage f, by simp⟩
#align category_theory.limits.image_subobject_factors_comp_self CategoryTheory.Limits.imageSubobject_factors_comp_self
@[simp]
theorem factorThruImageSubobject_comp_self {W : C} (k : W ⟶ X) (h) :
(imageSubobject f).factorThru (k ≫ f) h = k ≫ factorThruImageSubobject f := by
ext
simp
#align category_theory.limits.factor_thru_image_subobject_comp_self CategoryTheory.Limits.factorThruImageSubobject_comp_self
@[simp]
| Mathlib/CategoryTheory/Subobject/Limits.lean | 350 | 353 | theorem factorThruImageSubobject_comp_self_assoc {W W' : C} (k : W ⟶ W') (k' : W' ⟶ X) (h) :
(imageSubobject f).factorThru (k ≫ k' ≫ f) h = k ≫ k' ≫ factorThruImageSubobject f := by |
ext
simp
|
import Mathlib.Data.Fin.Tuple.Basic
import Mathlib.Data.List.Join
#align_import data.list.of_fn from "leanprover-community/mathlib"@"bf27744463e9620ca4e4ebe951fe83530ae6949b"
universe u
variable {α : Type u}
open Nat
namespace List
#noalign list.length_of_fn_aux
@[simp]
theorem length_ofFn_go {n} (f : Fin n → α) (i j h) : length (ofFn.go f i j h) = i := by
induction i generalizing j <;> simp_all [ofFn.go]
@[simp]
theorem length_ofFn {n} (f : Fin n → α) : length (ofFn f) = n := by
simp [ofFn, length_ofFn_go]
#align list.length_of_fn List.length_ofFn
#noalign list.nth_of_fn_aux
| Mathlib/Data/List/OfFn.lean | 50 | 54 | theorem get_ofFn_go {n} (f : Fin n → α) (i j h) (k) (hk) :
get (ofFn.go f i j h) ⟨k, hk⟩ = f ⟨j + k, by simp at hk; omega⟩ := by |
let i+1 := i
cases k <;> simp [ofFn.go, get_ofFn_go (i := i)]
congr 2; omega
|
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]
section Measurability
theorem measurable_condDistrib (hs : MeasurableSet s) :
Measurable[mβ.comap X] fun a => condDistrib Y X μ (X a) s :=
(kernel.measurable_coe _ hs).comp (Measurable.of_comap_le le_rfl)
#align probability_theory.measurable_cond_distrib ProbabilityTheory.measurable_condDistrib
| Mathlib/Probability/Kernel/CondDistrib.lean | 88 | 93 | theorem _root_.MeasureTheory.AEStronglyMeasurable.ae_integrable_condDistrib_map_iff
(hY : AEMeasurable Y μ) (hf : AEStronglyMeasurable f (μ.map fun a => (X a, Y a))) :
(∀ᵐ a ∂μ.map X, Integrable (fun ω => f (a, ω)) (condDistrib Y X μ a)) ∧
Integrable (fun a => ∫ ω, ‖f (a, ω)‖ ∂condDistrib Y X μ a) (μ.map X) ↔
Integrable f (μ.map fun a => (X a, Y a)) := by |
rw [condDistrib, ← hf.ae_integrable_condKernel_iff, Measure.fst_map_prod_mk₀ hY]
|
import Mathlib.Topology.Category.TopCat.Limits.Products
#align_import topology.category.Top.limits.pullbacks from "leanprover-community/mathlib"@"178a32653e369dce2da68dc6b2694e385d484ef1"
-- Porting note: every ML3 decl has an uppercase letter
set_option linter.uppercaseLean3 false
open TopologicalSpace
open CategoryTheory
open CategoryTheory.Limits
universe v u w
noncomputable section
namespace TopCat
variable {J : Type v} [SmallCategory J]
--TODO: Add analogous constructions for `pushout`.
| Mathlib/Topology/Category/TopCat/Limits/Pullbacks.lean | 447 | 452 | theorem coinduced_of_isColimit {F : J ⥤ TopCat.{max v u}} (c : Cocone F) (hc : IsColimit c) :
c.pt.str = ⨆ j, (F.obj j).str.coinduced (c.ι.app j) := by |
let homeo := homeoOfIso (hc.coconePointUniqueUpToIso (colimitCoconeIsColimit F))
ext
refine homeo.symm.isOpen_preimage.symm.trans (Iff.trans ?_ isOpen_iSup_iff.symm)
exact isOpen_iSup_iff
|
import Mathlib.Analysis.Complex.Basic
import Mathlib.Analysis.SpecificLimits.Normed
open Filter Finset
open scoped Topology
namespace Complex
section StolzSet
open Real
def stolzSet (M : ℝ) : Set ℂ := {z | ‖z‖ < 1 ∧ ‖1 - z‖ < M * (1 - ‖z‖)}
def stolzCone (s : ℝ) : Set ℂ := {z | |z.im| < s * (1 - z.re)}
| Mathlib/Analysis/Complex/AbelLimit.lean | 47 | 54 | theorem stolzSet_empty {M : ℝ} (hM : M ≤ 1) : stolzSet M = ∅ := by |
ext z
rw [stolzSet, Set.mem_setOf, Set.mem_empty_iff_false, iff_false, not_and, not_lt, ← sub_pos]
intro zn
calc
_ ≤ 1 * (1 - ‖z‖) := mul_le_mul_of_nonneg_right hM zn.le
_ = ‖(1 : ℂ)‖ - ‖z‖ := by rw [one_mul, norm_one]
_ ≤ _ := norm_sub_norm_le _ _
|
import Mathlib.Analysis.NormedSpace.OperatorNorm.NormedSpace
import Mathlib.Logic.Embedding.Basic
import Mathlib.Data.Fintype.CardEmbedding
import Mathlib.Topology.Algebra.Module.Multilinear.Topology
#align_import analysis.normed_space.multilinear from "leanprover-community/mathlib"@"f40476639bac089693a489c9e354ebd75dc0f886"
suppress_compilation
noncomputable section
open scoped NNReal Topology Uniformity
open Finset Metric Function Filter
universe u v v' wE wE₁ wE' wG wG'
section Seminorm
variable {𝕜 : Type u} {ι : Type v} {ι' : Type v'} {E : ι → Type wE} {E₁ : ι → Type wE₁}
{E' : ι' → Type wE'} {G : Type wG} {G' : Type wG'} [Fintype ι]
[Fintype ι'] [NontriviallyNormedField 𝕜] [∀ i, SeminormedAddCommGroup (E i)]
[∀ i, NormedSpace 𝕜 (E i)] [∀ i, SeminormedAddCommGroup (E₁ i)] [∀ i, NormedSpace 𝕜 (E₁ i)]
[∀ i, SeminormedAddCommGroup (E' i)] [∀ i, NormedSpace 𝕜 (E' i)]
[SeminormedAddCommGroup G] [NormedSpace 𝕜 G] [SeminormedAddCommGroup G'] [NormedSpace 𝕜 G']
namespace MultilinearMap
variable (f : MultilinearMap 𝕜 E G)
lemma norm_map_coord_zero (hf : Continuous f) {m : ∀ i, E i} {i : ι} (hi : ‖m i‖ = 0) :
‖f m‖ = 0 := by
classical
rw [← inseparable_zero_iff_norm] at hi ⊢
have : Inseparable (update m i 0) m := inseparable_pi.2 <|
(forall_update_iff m fun i a ↦ Inseparable a (m i)).2 ⟨hi.symm, fun _ _ ↦ rfl⟩
simpa only [map_update_zero] using this.symm.map hf
theorem bound_of_shell_of_norm_map_coord_zero (hf₀ : ∀ {m i}, ‖m i‖ = 0 → ‖f m‖ = 0)
{ε : ι → ℝ} {C : ℝ} (hε : ∀ i, 0 < ε i) {c : ι → 𝕜} (hc : ∀ i, 1 < ‖c i‖)
(hf : ∀ m : ∀ i, E i, (∀ i, ε i / ‖c i‖ ≤ ‖m i‖) → (∀ i, ‖m i‖ < ε i) → ‖f m‖ ≤ C * ∏ i, ‖m i‖)
(m : ∀ i, E i) : ‖f m‖ ≤ C * ∏ i, ‖m i‖ := by
rcases em (∃ i, ‖m i‖ = 0) with (⟨i, hi⟩ | hm)
· rw [hf₀ hi, prod_eq_zero (mem_univ i) hi, mul_zero]
push_neg at hm
choose δ hδ0 hδm_lt hle_δm _ using fun i => rescale_to_shell_semi_normed (hc i) (hε i) (hm i)
have hδ0 : 0 < ∏ i, ‖δ i‖ := prod_pos fun i _ => norm_pos_iff.2 (hδ0 i)
simpa [map_smul_univ, norm_smul, prod_mul_distrib, mul_left_comm C, mul_le_mul_left hδ0] using
hf (fun i => δ i • m i) hle_δm hδm_lt
theorem bound_of_shell_of_continuous (hfc : Continuous f)
{ε : ι → ℝ} {C : ℝ} (hε : ∀ i, 0 < ε i) {c : ι → 𝕜} (hc : ∀ i, 1 < ‖c i‖)
(hf : ∀ m : ∀ i, E i, (∀ i, ε i / ‖c i‖ ≤ ‖m i‖) → (∀ i, ‖m i‖ < ε i) → ‖f m‖ ≤ C * ∏ i, ‖m i‖)
(m : ∀ i, E i) : ‖f m‖ ≤ C * ∏ i, ‖m i‖ :=
bound_of_shell_of_norm_map_coord_zero f (norm_map_coord_zero f hfc) hε hc hf m
theorem exists_bound_of_continuous (hf : Continuous f) :
∃ C : ℝ, 0 < C ∧ ∀ m, ‖f m‖ ≤ C * ∏ i, ‖m i‖ := by
cases isEmpty_or_nonempty ι
· refine ⟨‖f 0‖ + 1, add_pos_of_nonneg_of_pos (norm_nonneg _) zero_lt_one, fun m => ?_⟩
obtain rfl : m = 0 := funext (IsEmpty.elim ‹_›)
simp [univ_eq_empty, zero_le_one]
obtain ⟨ε : ℝ, ε0 : 0 < ε, hε : ∀ m : ∀ i, E i, ‖m - 0‖ < ε → ‖f m - f 0‖ < 1⟩ :=
NormedAddCommGroup.tendsto_nhds_nhds.1 (hf.tendsto 0) 1 zero_lt_one
simp only [sub_zero, f.map_zero] at hε
rcases NormedField.exists_one_lt_norm 𝕜 with ⟨c, hc⟩
have : 0 < (‖c‖ / ε) ^ Fintype.card ι := pow_pos (div_pos (zero_lt_one.trans hc) ε0) _
refine ⟨_, this, ?_⟩
refine f.bound_of_shell_of_continuous hf (fun _ => ε0) (fun _ => hc) fun m hcm hm => ?_
refine (hε m ((pi_norm_lt_iff ε0).2 hm)).le.trans ?_
rw [← div_le_iff' this, one_div, ← inv_pow, inv_div, Fintype.card, ← prod_const]
exact prod_le_prod (fun _ _ => div_nonneg ε0.le (norm_nonneg _)) fun i _ => hcm i
#align multilinear_map.exists_bound_of_continuous MultilinearMap.exists_bound_of_continuous
theorem norm_image_sub_le_of_bound' [DecidableEq ι] {C : ℝ} (hC : 0 ≤ C)
(H : ∀ m, ‖f m‖ ≤ C * ∏ i, ‖m i‖) (m₁ m₂ : ∀ i, E i) :
‖f m₁ - f m₂‖ ≤ C * ∑ i, ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖ := by
have A :
∀ s : Finset ι,
‖f m₁ - f (s.piecewise m₂ m₁)‖ ≤
C * ∑ i ∈ s, ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖ := by
intro s
induction' s using Finset.induction with i s his Hrec
· simp
have I :
‖f (s.piecewise m₂ m₁) - f ((insert i s).piecewise m₂ m₁)‖ ≤
C * ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖ := by
have A : (insert i s).piecewise m₂ m₁ = Function.update (s.piecewise m₂ m₁) i (m₂ i) :=
s.piecewise_insert _ _ _
have B : s.piecewise m₂ m₁ = Function.update (s.piecewise m₂ m₁) i (m₁ i) := by
simp [eq_update_iff, his]
rw [B, A, ← f.map_sub]
apply le_trans (H _)
gcongr with j
· exact fun j _ => norm_nonneg _
by_cases h : j = i
· rw [h]
simp
· by_cases h' : j ∈ s <;> simp [h', h, le_refl]
calc
‖f m₁ - f ((insert i s).piecewise m₂ m₁)‖ ≤
‖f m₁ - f (s.piecewise m₂ m₁)‖ +
‖f (s.piecewise m₂ m₁) - f ((insert i s).piecewise m₂ m₁)‖ := by
rw [← dist_eq_norm, ← dist_eq_norm, ← dist_eq_norm]
exact dist_triangle _ _ _
_ ≤ (C * ∑ i ∈ s, ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖) +
C * ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖ :=
(add_le_add Hrec I)
_ = C * ∑ i ∈ insert i s, ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖ := by
simp [his, add_comm, left_distrib]
convert A univ
simp
#align multilinear_map.norm_image_sub_le_of_bound' MultilinearMap.norm_image_sub_le_of_bound'
| Mathlib/Analysis/NormedSpace/Multilinear/Basic.lean | 205 | 235 | theorem norm_image_sub_le_of_bound {C : ℝ} (hC : 0 ≤ C) (H : ∀ m, ‖f m‖ ≤ C * ∏ i, ‖m i‖)
(m₁ m₂ : ∀ i, E i) :
‖f m₁ - f m₂‖ ≤ C * Fintype.card ι * max ‖m₁‖ ‖m₂‖ ^ (Fintype.card ι - 1) * ‖m₁ - m₂‖ := by |
classical
have A :
∀ i : ι,
∏ j, (if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖) ≤
‖m₁ - m₂‖ * max ‖m₁‖ ‖m₂‖ ^ (Fintype.card ι - 1) := by
intro i
calc
∏ j, (if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖) ≤
∏ j : ι, Function.update (fun _ => max ‖m₁‖ ‖m₂‖) i ‖m₁ - m₂‖ j := by
apply Finset.prod_le_prod
· intro j _
by_cases h : j = i <;> simp [h, norm_nonneg]
· intro j _
by_cases h : j = i
· rw [h]
simp only [ite_true, Function.update_same]
exact norm_le_pi_norm (m₁ - m₂) i
· simp [h, -le_max_iff, -max_le_iff, max_le_max, norm_le_pi_norm (_ : ∀ i, E i)]
_ = ‖m₁ - m₂‖ * max ‖m₁‖ ‖m₂‖ ^ (Fintype.card ι - 1) := by
rw [prod_update_of_mem (Finset.mem_univ _)]
simp [card_univ_diff]
calc
‖f m₁ - f m₂‖ ≤ C * ∑ i, ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖ :=
f.norm_image_sub_le_of_bound' hC H m₁ m₂
_ ≤ C * ∑ _i, ‖m₁ - m₂‖ * max ‖m₁‖ ‖m₂‖ ^ (Fintype.card ι - 1) := by gcongr; apply A
_ = C * Fintype.card ι * max ‖m₁‖ ‖m₂‖ ^ (Fintype.card ι - 1) * ‖m₁ - m₂‖ := by
rw [sum_const, card_univ, nsmul_eq_mul]
ring
|
import Mathlib.FieldTheory.IsAlgClosed.AlgebraicClosure
import Mathlib.RingTheory.IntegralDomain
#align_import field_theory.primitive_element from "leanprover-community/mathlib"@"df76f43357840485b9d04ed5dee5ab115d420e87"
noncomputable section
open scoped Classical Polynomial
open FiniteDimensional Polynomial IntermediateField
namespace Field
section PrimitiveElementFinite
variable (F : Type*) [Field F] (E : Type*) [Field E] [Algebra F E]
| Mathlib/FieldTheory/PrimitiveElement.lean | 56 | 67 | theorem exists_primitive_element_of_finite_top [Finite E] : ∃ α : E, F⟮α⟯ = ⊤ := by |
obtain ⟨α, hα⟩ := @IsCyclic.exists_generator Eˣ _ _
use α
rw [eq_top_iff]
rintro x -
by_cases hx : x = 0
· rw [hx]
exact F⟮α.val⟯.zero_mem
· obtain ⟨n, hn⟩ := Set.mem_range.mp (hα (Units.mk0 x hx))
simp only at hn
rw [show x = α ^ n by norm_cast; rw [hn, Units.val_mk0]]
exact zpow_mem (mem_adjoin_simple_self F (E := E) ↑α) n
|
import Mathlib.Algebra.Order.Floor
import Mathlib.Topology.Algebra.Order.Group
import Mathlib.Topology.Order.Basic
#align_import topology.algebra.order.floor from "leanprover-community/mathlib"@"84dc0bd6619acaea625086d6f53cb35cdd554219"
open Filter Function Int Set Topology
variable {α β γ : Type*} [LinearOrderedRing α] [FloorRing α]
theorem tendsto_floor_atTop : Tendsto (floor : α → ℤ) atTop atTop :=
floor_mono.tendsto_atTop_atTop fun b =>
⟨(b + 1 : ℤ), by rw [floor_intCast]; exact (lt_add_one _).le⟩
#align tendsto_floor_at_top tendsto_floor_atTop
theorem tendsto_floor_atBot : Tendsto (floor : α → ℤ) atBot atBot :=
floor_mono.tendsto_atBot_atBot fun b => ⟨b, (floor_intCast _).le⟩
#align tendsto_floor_at_bot tendsto_floor_atBot
theorem tendsto_ceil_atTop : Tendsto (ceil : α → ℤ) atTop atTop :=
ceil_mono.tendsto_atTop_atTop fun b => ⟨b, (ceil_intCast _).ge⟩
#align tendsto_ceil_at_top tendsto_ceil_atTop
theorem tendsto_ceil_atBot : Tendsto (ceil : α → ℤ) atBot atBot :=
ceil_mono.tendsto_atBot_atBot fun b =>
⟨(b - 1 : ℤ), by rw [ceil_intCast]; exact (sub_one_lt _).le⟩
#align tendsto_ceil_at_bot tendsto_ceil_atBot
variable [TopologicalSpace α]
theorem continuousOn_floor (n : ℤ) :
ContinuousOn (fun x => floor x : α → α) (Ico n (n + 1) : Set α) :=
(continuousOn_congr <| floor_eq_on_Ico' n).mpr continuousOn_const
#align continuous_on_floor continuousOn_floor
theorem continuousOn_ceil (n : ℤ) :
ContinuousOn (fun x => ceil x : α → α) (Ioc (n - 1) n : Set α) :=
(continuousOn_congr <| ceil_eq_on_Ioc' n).mpr continuousOn_const
#align continuous_on_ceil continuousOn_ceil
section OrderClosedTopology
variable [OrderClosedTopology α]
-- Porting note (#10756): new theorem
theorem tendsto_floor_right_pure_floor (x : α) : Tendsto (floor : α → ℤ) (𝓝[≥] x) (pure ⌊x⌋) :=
tendsto_pure.2 <| mem_of_superset (Ico_mem_nhdsWithin_Ici' <| lt_floor_add_one x) fun _y hy =>
floor_eq_on_Ico _ _ ⟨(floor_le x).trans hy.1, hy.2⟩
-- Porting note (#10756): new theorem
theorem tendsto_floor_right_pure (n : ℤ) : Tendsto (floor : α → ℤ) (𝓝[≥] n) (pure n) := by
simpa only [floor_intCast] using tendsto_floor_right_pure_floor (n : α)
-- Porting note (#10756): new theorem
theorem tendsto_ceil_left_pure_ceil (x : α) : Tendsto (ceil : α → ℤ) (𝓝[≤] x) (pure ⌈x⌉) :=
tendsto_pure.2 <| mem_of_superset
(Ioc_mem_nhdsWithin_Iic' <| sub_lt_iff_lt_add.2 <| ceil_lt_add_one _) fun _y hy =>
ceil_eq_on_Ioc _ _ ⟨hy.1, hy.2.trans (le_ceil _)⟩
-- Porting note (#10756): new theorem
theorem tendsto_ceil_left_pure (n : ℤ) : Tendsto (ceil : α → ℤ) (𝓝[≤] n) (pure n) := by
simpa only [ceil_intCast] using tendsto_ceil_left_pure_ceil (n : α)
-- Porting note (#10756): new theorem
theorem tendsto_floor_left_pure_ceil_sub_one (x : α) :
Tendsto (floor : α → ℤ) (𝓝[<] x) (pure (⌈x⌉ - 1)) :=
have h₁ : ↑(⌈x⌉ - 1) < x := by rw [cast_sub, cast_one, sub_lt_iff_lt_add]; exact ceil_lt_add_one _
have h₂ : x ≤ ↑(⌈x⌉ - 1) + 1 := by rw [cast_sub, cast_one, sub_add_cancel]; exact le_ceil _
tendsto_pure.2 <| mem_of_superset (Ico_mem_nhdsWithin_Iio' h₁) fun _y hy =>
floor_eq_on_Ico _ _ ⟨hy.1, hy.2.trans_le h₂⟩
-- Porting note (#10756): new theorem
theorem tendsto_floor_left_pure_sub_one (n : ℤ) :
Tendsto (floor : α → ℤ) (𝓝[<] n) (pure (n - 1)) := by
simpa only [ceil_intCast] using tendsto_floor_left_pure_ceil_sub_one (n : α)
-- Porting note (#10756): new theorem
theorem tendsto_ceil_right_pure_floor_add_one (x : α) :
Tendsto (ceil : α → ℤ) (𝓝[>] x) (pure (⌊x⌋ + 1)) :=
have : ↑(⌊x⌋ + 1) - 1 ≤ x := by rw [cast_add, cast_one, add_sub_cancel_right]; exact floor_le _
tendsto_pure.2 <| mem_of_superset (Ioc_mem_nhdsWithin_Ioi' <| lt_succ_floor _) fun _y hy =>
ceil_eq_on_Ioc _ _ ⟨this.trans_lt hy.1, hy.2⟩
-- Porting note (#10756): new theorem
| Mathlib/Topology/Algebra/Order/Floor.lean | 108 | 110 | theorem tendsto_ceil_right_pure_add_one (n : ℤ) :
Tendsto (ceil : α → ℤ) (𝓝[>] n) (pure (n + 1)) := by |
simpa only [floor_intCast] using tendsto_ceil_right_pure_floor_add_one (n : α)
|
import Mathlib.Order.Filter.Bases
#align_import order.filter.pi from "leanprover-community/mathlib"@"ce64cd319bb6b3e82f31c2d38e79080d377be451"
open Set Function
open scoped Classical
open Filter
namespace Filter
variable {ι : Type*} {α : ι → Type*} {f f₁ f₂ : (i : ι) → Filter (α i)} {s : (i : ι) → Set (α i)}
{p : ∀ i, α i → Prop}
section Pi
def pi (f : ∀ i, Filter (α i)) : Filter (∀ i, α i) :=
⨅ i, comap (eval i) (f i)
#align filter.pi Filter.pi
instance pi.isCountablyGenerated [Countable ι] [∀ i, IsCountablyGenerated (f i)] :
IsCountablyGenerated (pi f) :=
iInf.isCountablyGenerated _
#align filter.pi.is_countably_generated Filter.pi.isCountablyGenerated
theorem tendsto_eval_pi (f : ∀ i, Filter (α i)) (i : ι) : Tendsto (eval i) (pi f) (f i) :=
tendsto_iInf' i tendsto_comap
#align filter.tendsto_eval_pi Filter.tendsto_eval_pi
theorem tendsto_pi {β : Type*} {m : β → ∀ i, α i} {l : Filter β} :
Tendsto m l (pi f) ↔ ∀ i, Tendsto (fun x => m x i) l (f i) := by
simp only [pi, tendsto_iInf, tendsto_comap_iff]; rfl
#align filter.tendsto_pi Filter.tendsto_pi
alias ⟨Tendsto.apply, _⟩ := tendsto_pi
theorem le_pi {g : Filter (∀ i, α i)} : g ≤ pi f ↔ ∀ i, Tendsto (eval i) g (f i) :=
tendsto_pi
#align filter.le_pi Filter.le_pi
@[mono]
theorem pi_mono (h : ∀ i, f₁ i ≤ f₂ i) : pi f₁ ≤ pi f₂ :=
iInf_mono fun i => comap_mono <| h i
#align filter.pi_mono Filter.pi_mono
theorem mem_pi_of_mem (i : ι) {s : Set (α i)} (hs : s ∈ f i) : eval i ⁻¹' s ∈ pi f :=
mem_iInf_of_mem i <| preimage_mem_comap hs
#align filter.mem_pi_of_mem Filter.mem_pi_of_mem
theorem pi_mem_pi {I : Set ι} (hI : I.Finite) (h : ∀ i ∈ I, s i ∈ f i) : I.pi s ∈ pi f := by
rw [pi_def, biInter_eq_iInter]
refine mem_iInf_of_iInter hI (fun i => ?_) Subset.rfl
exact preimage_mem_comap (h i i.2)
#align filter.pi_mem_pi Filter.pi_mem_pi
| Mathlib/Order/Filter/Pi.lean | 80 | 88 | theorem mem_pi {s : Set (∀ i, α i)} :
s ∈ pi f ↔ ∃ I : Set ι, I.Finite ∧ ∃ t : ∀ i, Set (α i), (∀ i, t i ∈ f i) ∧ I.pi t ⊆ s := by |
constructor
· simp only [pi, mem_iInf', mem_comap, pi_def]
rintro ⟨I, If, V, hVf, -, rfl, -⟩
choose t htf htV using hVf
exact ⟨I, If, t, htf, iInter₂_mono fun i _ => htV i⟩
· rintro ⟨I, If, t, htf, hts⟩
exact mem_of_superset (pi_mem_pi If fun i _ => htf i) hts
|
import Mathlib.Analysis.InnerProductSpace.PiL2
import Mathlib.Combinatorics.Additive.AP.Three.Defs
import Mathlib.Combinatorics.Pigeonhole
import Mathlib.Data.Complex.ExponentialBounds
#align_import combinatorics.additive.behrend from "leanprover-community/mathlib"@"4fa54b337f7d52805480306db1b1439c741848c8"
open Nat hiding log
open Finset Metric Real
open scoped Pointwise
lemma threeAPFree_frontier {𝕜 E : Type*} [LinearOrderedField 𝕜] [TopologicalSpace E]
[AddCommMonoid E] [Module 𝕜 E] {s : Set E} (hs₀ : IsClosed s) (hs₁ : StrictConvex 𝕜 s) :
ThreeAPFree (frontier s) := by
intro a ha b hb c hc habc
obtain rfl : (1 / 2 : 𝕜) • a + (1 / 2 : 𝕜) • c = b := by
rwa [← smul_add, one_div, inv_smul_eq_iff₀ (show (2 : 𝕜) ≠ 0 by norm_num), two_smul]
have :=
hs₁.eq (hs₀.frontier_subset ha) (hs₀.frontier_subset hc) one_half_pos one_half_pos
(add_halves _) hb.2
simp [this, ← add_smul]
ring_nf
simp
#align add_salem_spencer_frontier threeAPFree_frontier
lemma threeAPFree_sphere {E : Type*} [NormedAddCommGroup E] [NormedSpace ℝ E]
[StrictConvexSpace ℝ E] (x : E) (r : ℝ) : ThreeAPFree (sphere x r) := by
obtain rfl | hr := eq_or_ne r 0
· rw [sphere_zero]
exact threeAPFree_singleton _
· convert threeAPFree_frontier isClosed_ball (strictConvex_closedBall ℝ x r)
exact (frontier_closedBall _ hr).symm
#align add_salem_spencer_sphere threeAPFree_sphere
namespace Behrend
variable {α β : Type*} {n d k N : ℕ} {x : Fin n → ℕ}
def box (n d : ℕ) : Finset (Fin n → ℕ) :=
Fintype.piFinset fun _ => range d
#align behrend.box Behrend.box
theorem mem_box : x ∈ box n d ↔ ∀ i, x i < d := by simp only [box, Fintype.mem_piFinset, mem_range]
#align behrend.mem_box Behrend.mem_box
@[simp]
theorem card_box : (box n d).card = d ^ n := by simp [box]
#align behrend.card_box Behrend.card_box
@[simp]
theorem box_zero : box (n + 1) 0 = ∅ := by simp [box]
#align behrend.box_zero Behrend.box_zero
def sphere (n d k : ℕ) : Finset (Fin n → ℕ) :=
(box n d).filter fun x => ∑ i, x i ^ 2 = k
#align behrend.sphere Behrend.sphere
theorem sphere_zero_subset : sphere n d 0 ⊆ 0 := fun x => by simp [sphere, Function.funext_iff]
#align behrend.sphere_zero_subset Behrend.sphere_zero_subset
@[simp]
theorem sphere_zero_right (n k : ℕ) : sphere (n + 1) 0 k = ∅ := by simp [sphere]
#align behrend.sphere_zero_right Behrend.sphere_zero_right
theorem sphere_subset_box : sphere n d k ⊆ box n d :=
filter_subset _ _
#align behrend.sphere_subset_box Behrend.sphere_subset_box
theorem norm_of_mem_sphere {x : Fin n → ℕ} (hx : x ∈ sphere n d k) :
‖(WithLp.equiv 2 _).symm ((↑) ∘ x : Fin n → ℝ)‖ = √↑k := by
rw [EuclideanSpace.norm_eq]
dsimp
simp_rw [abs_cast, ← cast_pow, ← cast_sum, (mem_filter.1 hx).2]
#align behrend.norm_of_mem_sphere Behrend.norm_of_mem_sphere
theorem sphere_subset_preimage_metric_sphere : (sphere n d k : Set (Fin n → ℕ)) ⊆
(fun x : Fin n → ℕ => (WithLp.equiv 2 _).symm ((↑) ∘ x : Fin n → ℝ)) ⁻¹'
Metric.sphere (0 : PiLp 2 fun _ : Fin n => ℝ) (√↑k) :=
fun x hx => by rw [Set.mem_preimage, mem_sphere_zero_iff_norm, norm_of_mem_sphere hx]
#align behrend.sphere_subset_preimage_metric_sphere Behrend.sphere_subset_preimage_metric_sphere
@[simps]
def map (d : ℕ) : (Fin n → ℕ) →+ ℕ where
toFun a := ∑ i, a i * d ^ (i : ℕ)
map_zero' := by simp_rw [Pi.zero_apply, zero_mul, sum_const_zero]
map_add' a b := by simp_rw [Pi.add_apply, add_mul, sum_add_distrib]
#align behrend.map Behrend.map
-- @[simp] -- Porting note (#10618): simp can prove this
theorem map_zero (d : ℕ) (a : Fin 0 → ℕ) : map d a = 0 := by simp [map]
#align behrend.map_zero Behrend.map_zero
theorem map_succ (a : Fin (n + 1) → ℕ) :
map d a = a 0 + (∑ x : Fin n, a x.succ * d ^ (x : ℕ)) * d := by
simp [map, Fin.sum_univ_succ, _root_.pow_succ, ← mul_assoc, ← sum_mul]
#align behrend.map_succ Behrend.map_succ
theorem map_succ' (a : Fin (n + 1) → ℕ) : map d a = a 0 + map d (a ∘ Fin.succ) * d :=
map_succ _
#align behrend.map_succ' Behrend.map_succ'
theorem map_monotone (d : ℕ) : Monotone (map d : (Fin n → ℕ) → ℕ) := fun x y h => by
dsimp; exact sum_le_sum fun i _ => Nat.mul_le_mul_right _ <| h i
#align behrend.map_monotone Behrend.map_monotone
theorem map_mod (a : Fin n.succ → ℕ) : map d a % d = a 0 % d := by
rw [map_succ, Nat.add_mul_mod_self_right]
#align behrend.map_mod Behrend.map_mod
theorem map_eq_iff {x₁ x₂ : Fin n.succ → ℕ} (hx₁ : ∀ i, x₁ i < d) (hx₂ : ∀ i, x₂ i < d) :
map d x₁ = map d x₂ ↔ x₁ 0 = x₂ 0 ∧ map d (x₁ ∘ Fin.succ) = map d (x₂ ∘ Fin.succ) := by
refine ⟨fun h => ?_, fun h => by rw [map_succ', map_succ', h.1, h.2]⟩
have : x₁ 0 = x₂ 0 := by
rw [← mod_eq_of_lt (hx₁ _), ← map_mod, ← mod_eq_of_lt (hx₂ _), ← map_mod, h]
rw [map_succ, map_succ, this, add_right_inj, mul_eq_mul_right_iff] at h
exact ⟨this, h.resolve_right (pos_of_gt (hx₁ 0)).ne'⟩
#align behrend.map_eq_iff Behrend.map_eq_iff
theorem map_injOn : {x : Fin n → ℕ | ∀ i, x i < d}.InjOn (map d) := by
intro x₁ hx₁ x₂ hx₂ h
induction' n with n ih
· simp [eq_iff_true_of_subsingleton]
rw [forall_const] at ih
ext i
have x := (map_eq_iff hx₁ hx₂).1 h
refine Fin.cases x.1 (congr_fun <| ih (fun _ => ?_) (fun _ => ?_) x.2) i
· exact hx₁ _
· exact hx₂ _
#align behrend.map_inj_on Behrend.map_injOn
theorem map_le_of_mem_box (hx : x ∈ box n d) :
map (2 * d - 1) x ≤ ∑ i : Fin n, (d - 1) * (2 * d - 1) ^ (i : ℕ) :=
map_monotone (2 * d - 1) fun _ => Nat.le_sub_one_of_lt <| mem_box.1 hx _
#align behrend.map_le_of_mem_box Behrend.map_le_of_mem_box
nonrec theorem threeAPFree_sphere : ThreeAPFree (sphere n d k : Set (Fin n → ℕ)) := by
set f : (Fin n → ℕ) →+ EuclideanSpace ℝ (Fin n) :=
{ toFun := fun f => ((↑) : ℕ → ℝ) ∘ f
map_zero' := funext fun _ => cast_zero
map_add' := fun _ _ => funext fun _ => cast_add _ _ }
refine ThreeAPFree.of_image (AddMonoidHomClass.isAddFreimanHom f (Set.mapsTo_image _ _))
cast_injective.comp_left.injOn (Set.subset_univ _) ?_
refine (threeAPFree_sphere 0 (√↑k)).mono (Set.image_subset_iff.2 fun x => ?_)
rw [Set.mem_preimage, mem_sphere_zero_iff_norm]
exact norm_of_mem_sphere
#align behrend.add_salem_spencer_sphere Behrend.threeAPFree_sphere
theorem threeAPFree_image_sphere :
ThreeAPFree ((sphere n d k).image (map (2 * d - 1)) : Set ℕ) := by
rw [coe_image]
apply ThreeAPFree.image' (α := Fin n → ℕ) (β := ℕ) (s := sphere n d k) (map (2 * d - 1))
(map_injOn.mono _) threeAPFree_sphere
· rw [Set.add_subset_iff]
rintro a ha b hb i
have hai := mem_box.1 (sphere_subset_box ha) i
have hbi := mem_box.1 (sphere_subset_box hb) i
rw [lt_tsub_iff_right, ← succ_le_iff, two_mul]
exact (add_add_add_comm _ _ 1 1).trans_le (_root_.add_le_add hai hbi)
· exact x
#align behrend.add_salem_spencer_image_sphere Behrend.threeAPFree_image_sphere
theorem sum_sq_le_of_mem_box (hx : x ∈ box n d) : ∑ i : Fin n, x i ^ 2 ≤ n * (d - 1) ^ 2 := by
rw [mem_box] at hx
have : ∀ i, x i ^ 2 ≤ (d - 1) ^ 2 := fun i =>
Nat.pow_le_pow_left (Nat.le_sub_one_of_lt (hx i)) _
exact (sum_le_card_nsmul univ _ _ fun i _ => this i).trans (by rw [card_fin, smul_eq_mul])
#align behrend.sum_sq_le_of_mem_box Behrend.sum_sq_le_of_mem_box
theorem sum_eq : (∑ i : Fin n, d * (2 * d + 1) ^ (i : ℕ)) = ((2 * d + 1) ^ n - 1) / 2 := by
refine (Nat.div_eq_of_eq_mul_left zero_lt_two ?_).symm
rw [← sum_range fun i => d * (2 * d + 1) ^ (i : ℕ), ← mul_sum, mul_right_comm, mul_comm d, ←
geom_sum_mul_add, add_tsub_cancel_right, mul_comm]
#align behrend.sum_eq Behrend.sum_eq
theorem sum_lt : (∑ i : Fin n, d * (2 * d + 1) ^ (i : ℕ)) < (2 * d + 1) ^ n :=
sum_eq.trans_lt <| (Nat.div_le_self _ 2).trans_lt <| pred_lt (pow_pos (succ_pos _) _).ne'
#align behrend.sum_lt Behrend.sum_lt
| Mathlib/Combinatorics/Additive/AP/Three/Behrend.lean | 236 | 251 | theorem card_sphere_le_rothNumberNat (n d k : ℕ) :
(sphere n d k).card ≤ rothNumberNat ((2 * d - 1) ^ n) := by |
cases n
· dsimp; refine (card_le_univ _).trans_eq ?_; rfl
cases d
· simp
apply threeAPFree_image_sphere.le_rothNumberNat _ _ (card_image_of_injOn _)
· intro; assumption
· simp only [subset_iff, mem_image, and_imp, forall_exists_index, mem_range,
forall_apply_eq_imp_iff₂, sphere, mem_filter]
rintro _ x hx _ rfl
exact (map_le_of_mem_box hx).trans_lt sum_lt
apply map_injOn.mono fun x => ?_
· intro; assumption
simp only [mem_coe, sphere, mem_filter, mem_box, and_imp, two_mul]
exact fun h _ i => (h i).trans_le le_self_add
|
import Mathlib.Algebra.Order.Field.Basic
import Mathlib.Algebra.Order.Ring.Rat
import Mathlib.Data.Multiset.Sort
import Mathlib.Data.PNat.Basic
import Mathlib.Data.PNat.Interval
import Mathlib.Tactic.NormNum
import Mathlib.Tactic.IntervalCases
#align_import number_theory.ADE_inequality from "leanprover-community/mathlib"@"0a0ec35061ed9960bf0e7ffb0335f44447b58977"
namespace ADEInequality
open Multiset
-- Porting note: ADE is a special name, exceptionally in upper case in Lean3
set_option linter.uppercaseLean3 false
def A' (q r : ℕ+) : Multiset ℕ+ :=
{1, q, r}
#align ADE_inequality.A' ADEInequality.A'
def A (r : ℕ+) : Multiset ℕ+ :=
A' 1 r
#align ADE_inequality.A ADEInequality.A
def D' (r : ℕ+) : Multiset ℕ+ :=
{2, 2, r}
#align ADE_inequality.D' ADEInequality.D'
def E' (r : ℕ+) : Multiset ℕ+ :=
{2, 3, r}
#align ADE_inequality.E' ADEInequality.E'
def E6 : Multiset ℕ+ :=
E' 3
#align ADE_inequality.E6 ADEInequality.E6
def E7 : Multiset ℕ+ :=
E' 4
#align ADE_inequality.E7 ADEInequality.E7
def E8 : Multiset ℕ+ :=
E' 5
#align ADE_inequality.E8 ADEInequality.E8
def sumInv (pqr : Multiset ℕ+) : ℚ :=
Multiset.sum (pqr.map fun (x : ℕ+) => x⁻¹)
#align ADE_inequality.sum_inv ADEInequality.sumInv
theorem sumInv_pqr (p q r : ℕ+) : sumInv {p, q, r} = (p : ℚ)⁻¹ + (q : ℚ)⁻¹ + (r : ℚ)⁻¹ := by
simp only [sumInv, add_zero, insert_eq_cons, add_assoc, map_cons, sum_cons,
map_singleton, sum_singleton]
#align ADE_inequality.sum_inv_pqr ADEInequality.sumInv_pqr
def Admissible (pqr : Multiset ℕ+) : Prop :=
(∃ q r, A' q r = pqr) ∨ (∃ r, D' r = pqr) ∨ E' 3 = pqr ∨ E' 4 = pqr ∨ E' 5 = pqr
#align ADE_inequality.admissible ADEInequality.Admissible
theorem admissible_A' (q r : ℕ+) : Admissible (A' q r) :=
Or.inl ⟨q, r, rfl⟩
#align ADE_inequality.admissible_A' ADEInequality.admissible_A'
theorem admissible_D' (n : ℕ+) : Admissible (D' n) :=
Or.inr <| Or.inl ⟨n, rfl⟩
#align ADE_inequality.admissible_D' ADEInequality.admissible_D'
theorem admissible_E'3 : Admissible (E' 3) :=
Or.inr <| Or.inr <| Or.inl rfl
#align ADE_inequality.admissible_E'3 ADEInequality.admissible_E'3
theorem admissible_E'4 : Admissible (E' 4) :=
Or.inr <| Or.inr <| Or.inr <| Or.inl rfl
#align ADE_inequality.admissible_E'4 ADEInequality.admissible_E'4
theorem admissible_E'5 : Admissible (E' 5) :=
Or.inr <| Or.inr <| Or.inr <| Or.inr rfl
#align ADE_inequality.admissible_E'5 ADEInequality.admissible_E'5
theorem admissible_E6 : Admissible E6 :=
admissible_E'3
#align ADE_inequality.admissible_E6 ADEInequality.admissible_E6
theorem admissible_E7 : Admissible E7 :=
admissible_E'4
#align ADE_inequality.admissible_E7 ADEInequality.admissible_E7
theorem admissible_E8 : Admissible E8 :=
admissible_E'5
#align ADE_inequality.admissible_E8 ADEInequality.admissible_E8
theorem Admissible.one_lt_sumInv {pqr : Multiset ℕ+} : Admissible pqr → 1 < sumInv pqr := by
rw [Admissible]
rintro (⟨p', q', H⟩ | ⟨n, H⟩ | H | H | H)
· rw [← H, A', sumInv_pqr, add_assoc]
simp only [lt_add_iff_pos_right, PNat.one_coe, inv_one, Nat.cast_one]
apply add_pos <;> simp only [PNat.pos, Nat.cast_pos, inv_pos]
· rw [← H, D', sumInv_pqr]
conv_rhs => simp only [OfNat.ofNat, PNat.mk_coe]
norm_num
all_goals
rw [← H, E', sumInv_pqr]
conv_rhs => simp only [OfNat.ofNat, PNat.mk_coe]
rfl
#align ADE_inequality.admissible.one_lt_sum_inv ADEInequality.Admissible.one_lt_sumInv
theorem lt_three {p q r : ℕ+} (hpq : p ≤ q) (hqr : q ≤ r) (H : 1 < sumInv {p, q, r}) : p < 3 := by
have h3 : (0 : ℚ) < 3 := by norm_num
contrapose! H
rw [sumInv_pqr]
have h3q := H.trans hpq
have h3r := h3q.trans hqr
have hp: (p : ℚ)⁻¹ ≤ 3⁻¹ := by
rw [inv_le_inv _ h3]
· assumption_mod_cast
· norm_num
have hq: (q : ℚ)⁻¹ ≤ 3⁻¹ := by
rw [inv_le_inv _ h3]
· assumption_mod_cast
· norm_num
have hr: (r : ℚ)⁻¹ ≤ 3⁻¹ := by
rw [inv_le_inv _ h3]
· assumption_mod_cast
· norm_num
calc
(p : ℚ)⁻¹ + (q : ℚ)⁻¹ + (r : ℚ)⁻¹ ≤ 3⁻¹ + 3⁻¹ + 3⁻¹ := add_le_add (add_le_add hp hq) hr
_ = 1 := by norm_num
#align ADE_inequality.lt_three ADEInequality.lt_three
| Mathlib/NumberTheory/ADEInequality.lean | 198 | 213 | theorem lt_four {q r : ℕ+} (hqr : q ≤ r) (H : 1 < sumInv {2, q, r}) : q < 4 := by |
have h4 : (0 : ℚ) < 4 := by norm_num
contrapose! H
rw [sumInv_pqr]
have h4r := H.trans hqr
have hq: (q : ℚ)⁻¹ ≤ 4⁻¹ := by
rw [inv_le_inv _ h4]
· assumption_mod_cast
· norm_num
have hr: (r : ℚ)⁻¹ ≤ 4⁻¹ := by
rw [inv_le_inv _ h4]
· assumption_mod_cast
· norm_num
calc
(2⁻¹ + (q : ℚ)⁻¹ + (r : ℚ)⁻¹) ≤ 2⁻¹ + 4⁻¹ + 4⁻¹ := add_le_add (add_le_add le_rfl hq) hr
_ = 1 := by norm_num
|
import Mathlib.LinearAlgebra.Basis.VectorSpace
import Mathlib.LinearAlgebra.Dimension.Finite
import Mathlib.SetTheory.Cardinal.Subfield
import Mathlib.LinearAlgebra.Dimension.RankNullity
#align_import linear_algebra.dimension from "leanprover-community/mathlib"@"47a5f8186becdbc826190ced4312f8199f9db6a5"
noncomputable section
universe u₀ u v v' v'' u₁' w w'
variable {K R : Type u} {V V₁ V₂ V₃ : Type v} {V' V'₁ : Type v'} {V'' : Type v''}
variable {ι : Type w} {ι' : Type w'} {η : Type u₁'} {φ : η → Type*}
open Cardinal Basis Submodule Function Set
section Module
section Cardinal
variable (K)
variable [DivisionRing K]
theorem max_aleph0_card_le_rank_fun_nat : max ℵ₀ #K ≤ Module.rank K (ℕ → K) := by
have aleph0_le : ℵ₀ ≤ Module.rank K (ℕ → K) := (rank_finsupp_self K ℕ).symm.trans_le
(Finsupp.lcoeFun.rank_le_of_injective <| by exact DFunLike.coe_injective)
refine max_le aleph0_le ?_
obtain card_K | card_K := le_or_lt #K ℵ₀
· exact card_K.trans aleph0_le
by_contra!
obtain ⟨⟨ιK, bK⟩⟩ := Module.Free.exists_basis (R := K) (M := ℕ → K)
let L := Subfield.closure (Set.range (fun i : ιK × ℕ ↦ bK i.1 i.2))
have hLK : #L < #K := by
refine (Subfield.cardinal_mk_closure_le_max _).trans_lt
(max_lt_iff.mpr ⟨mk_range_le.trans_lt ?_, card_K⟩)
rwa [mk_prod, ← aleph0, lift_uzero, bK.mk_eq_rank'', mul_aleph0_eq aleph0_le]
letI := Module.compHom K (RingHom.op L.subtype)
obtain ⟨⟨ιL, bL⟩⟩ := Module.Free.exists_basis (R := Lᵐᵒᵖ) (M := K)
have card_ιL : ℵ₀ ≤ #ιL := by
contrapose! hLK
haveI := @Fintype.ofFinite _ (lt_aleph0_iff_finite.mp hLK)
rw [bL.repr.toEquiv.cardinal_eq, mk_finsupp_of_fintype,
← MulOpposite.opEquiv.cardinal_eq] at card_K ⊢
apply power_nat_le
contrapose! card_K
exact (power_lt_aleph0 card_K <| nat_lt_aleph0 _).le
obtain ⟨e⟩ := lift_mk_le'.mp (card_ιL.trans_eq (lift_uzero #ιL).symm)
have rep_e := bK.total_repr (bL ∘ e)
rw [Finsupp.total_apply, Finsupp.sum] at rep_e
set c := bK.repr (bL ∘ e)
set s := c.support
let f i (j : s) : L := ⟨bK j i, Subfield.subset_closure ⟨(j, i), rfl⟩⟩
have : ¬LinearIndependent Lᵐᵒᵖ f := fun h ↦ by
have := h.cardinal_lift_le_rank
rw [lift_uzero, (LinearEquiv.piCongrRight fun _ ↦ MulOpposite.opLinearEquiv Lᵐᵒᵖ).rank_eq,
rank_fun'] at this
exact (nat_lt_aleph0 _).not_le this
obtain ⟨t, g, eq0, i, hi, hgi⟩ := not_linearIndependent_iff.mp this
refine hgi (linearIndependent_iff'.mp (bL.linearIndependent.comp e e.injective) t g ?_ i hi)
clear_value c s
simp_rw [← rep_e, Finset.sum_apply, Pi.smul_apply, Finset.smul_sum]
rw [Finset.sum_comm]
refine Finset.sum_eq_zero fun i hi ↦ ?_
replace eq0 := congr_arg L.subtype (congr_fun eq0 ⟨i, hi⟩)
rw [Finset.sum_apply, map_sum] at eq0
have : SMulCommClass Lᵐᵒᵖ K K := ⟨fun _ _ _ ↦ mul_assoc _ _ _⟩
simp_rw [smul_comm _ (c i), ← Finset.smul_sum]
erw [eq0, smul_zero]
variable {K}
open Function in
theorem rank_fun_infinite {ι : Type v} [hι : Infinite ι] : Module.rank K (ι → K) = #(ι → K) := by
obtain ⟨⟨ιK, bK⟩⟩ := Module.Free.exists_basis (R := K) (M := ι → K)
obtain ⟨e⟩ := lift_mk_le'.mp ((aleph0_le_mk_iff.mpr hι).trans_eq (lift_uzero #ι).symm)
have := LinearMap.lift_rank_le_of_injective _ <|
LinearMap.funLeft_injective_of_surjective K K _ (invFun_surjective e.injective)
rw [lift_umax.{u,v}, lift_id'.{u,v}] at this
have key := (lift_le.{v}.mpr <| max_aleph0_card_le_rank_fun_nat K).trans this
rw [lift_max, lift_aleph0, max_le_iff] at key
haveI : Infinite ιK := by
rw [← aleph0_le_mk_iff, bK.mk_eq_rank'']; exact key.1
rw [bK.repr.toEquiv.cardinal_eq, mk_finsupp_lift_of_infinite,
lift_umax.{u,v}, lift_id'.{u,v}, bK.mk_eq_rank'', eq_comm, max_eq_left]
exact key.2
theorem rank_dual_eq_card_dual_of_aleph0_le_rank' {V : Type*} [AddCommGroup V] [Module K V]
(h : ℵ₀ ≤ Module.rank K V) : Module.rank Kᵐᵒᵖ (V →ₗ[K] K) = #(V →ₗ[K] K) := by
obtain ⟨⟨ι, b⟩⟩ := Module.Free.exists_basis (R := K) (M := V)
rw [← b.mk_eq_rank'', aleph0_le_mk_iff] at h
have e := (b.constr Kᵐᵒᵖ (M' := K)).symm.trans
(LinearEquiv.piCongrRight fun _ ↦ MulOpposite.opLinearEquiv Kᵐᵒᵖ)
rw [e.rank_eq, e.toEquiv.cardinal_eq]
apply rank_fun_infinite
theorem rank_dual_eq_card_dual_of_aleph0_le_rank {K V} [Field K] [AddCommGroup V] [Module K V]
(h : ℵ₀ ≤ Module.rank K V) : Module.rank K (V →ₗ[K] K) = #(V →ₗ[K] K) := by
obtain ⟨⟨ι, b⟩⟩ := Module.Free.exists_basis (R := K) (M := V)
rw [← b.mk_eq_rank'', aleph0_le_mk_iff] at h
have e := (b.constr K (M' := K)).symm
rw [e.rank_eq, e.toEquiv.cardinal_eq]
apply rank_fun_infinite
theorem lift_rank_lt_rank_dual' {V : Type v} [AddCommGroup V] [Module K V]
(h : ℵ₀ ≤ Module.rank K V) :
Cardinal.lift.{u} (Module.rank K V) < Module.rank Kᵐᵒᵖ (V →ₗ[K] K) := by
obtain ⟨⟨ι, b⟩⟩ := Module.Free.exists_basis (R := K) (M := V)
rw [← b.mk_eq_rank'', rank_dual_eq_card_dual_of_aleph0_le_rank' h,
← (b.constr ℕ (M' := K)).toEquiv.cardinal_eq, mk_arrow]
apply cantor'
erw [nat_lt_lift_iff, one_lt_iff_nontrivial]
infer_instance
theorem lift_rank_lt_rank_dual {K : Type u} {V : Type v} [Field K] [AddCommGroup V] [Module K V]
(h : ℵ₀ ≤ Module.rank K V) :
Cardinal.lift.{u} (Module.rank K V) < Module.rank K (V →ₗ[K] K) := by
rw [rank_dual_eq_card_dual_of_aleph0_le_rank h, ← rank_dual_eq_card_dual_of_aleph0_le_rank' h]
exact lift_rank_lt_rank_dual' h
theorem rank_lt_rank_dual' {V : Type u} [AddCommGroup V] [Module K V] (h : ℵ₀ ≤ Module.rank K V) :
Module.rank K V < Module.rank Kᵐᵒᵖ (V →ₗ[K] K) := by
convert lift_rank_lt_rank_dual' h; rw [lift_id]
| Mathlib/LinearAlgebra/Dimension/DivisionRing.lean | 342 | 344 | theorem rank_lt_rank_dual {K V : Type u} [Field K] [AddCommGroup V] [Module K V]
(h : ℵ₀ ≤ Module.rank K V) : Module.rank K V < Module.rank K (V →ₗ[K] K) := by |
convert lift_rank_lt_rank_dual h; rw [lift_id]
|
import Mathlib.LinearAlgebra.ExteriorAlgebra.Basic
import Mathlib.LinearAlgebra.CliffordAlgebra.Fold
import Mathlib.LinearAlgebra.CliffordAlgebra.Conjugation
import Mathlib.LinearAlgebra.Dual
#align_import linear_algebra.clifford_algebra.contraction from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a"
open LinearMap (BilinForm)
universe u1 u2 u3
variable {R : Type u1} [CommRing R]
variable {M : Type u2} [AddCommGroup M] [Module R M]
variable (Q : QuadraticForm R M)
namespace CliffordAlgebra
section contractLeft
variable (d d' : Module.Dual R M)
@[simps!]
def contractLeftAux (d : Module.Dual R M) :
M →ₗ[R] CliffordAlgebra Q × CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q :=
haveI v_mul := (Algebra.lmul R (CliffordAlgebra Q)).toLinearMap ∘ₗ ι Q
d.smulRight (LinearMap.fst _ (CliffordAlgebra Q) (CliffordAlgebra Q)) -
v_mul.compl₂ (LinearMap.snd _ (CliffordAlgebra Q) _)
#align clifford_algebra.contract_left_aux CliffordAlgebra.contractLeftAux
theorem contractLeftAux_contractLeftAux (v : M) (x : CliffordAlgebra Q) (fx : CliffordAlgebra Q) :
contractLeftAux Q d v (ι Q v * x, contractLeftAux Q d v (x, fx)) = Q v • fx := by
simp only [contractLeftAux_apply_apply]
rw [mul_sub, ← mul_assoc, ι_sq_scalar, ← Algebra.smul_def, ← sub_add, mul_smul_comm, sub_self,
zero_add]
#align clifford_algebra.contract_left_aux_contract_left_aux CliffordAlgebra.contractLeftAux_contractLeftAux
variable {Q}
def contractLeft : Module.Dual R M →ₗ[R] CliffordAlgebra Q →ₗ[R] CliffordAlgebra Q where
toFun d := foldr' Q (contractLeftAux Q d) (contractLeftAux_contractLeftAux Q d) 0
map_add' d₁ d₂ :=
LinearMap.ext fun x => by
dsimp only
rw [LinearMap.add_apply]
induction' x using CliffordAlgebra.left_induction with r x y hx hy m x hx
· simp_rw [foldr'_algebraMap, smul_zero, zero_add]
· rw [map_add, map_add, map_add, add_add_add_comm, hx, hy]
· rw [foldr'_ι_mul, foldr'_ι_mul, foldr'_ι_mul, hx]
dsimp only [contractLeftAux_apply_apply]
rw [sub_add_sub_comm, mul_add, LinearMap.add_apply, add_smul]
map_smul' c d :=
LinearMap.ext fun x => by
dsimp only
rw [LinearMap.smul_apply, RingHom.id_apply]
induction' x using CliffordAlgebra.left_induction with r x y hx hy m x hx
· simp_rw [foldr'_algebraMap, smul_zero]
· rw [map_add, map_add, smul_add, hx, hy]
· rw [foldr'_ι_mul, foldr'_ι_mul, hx]
dsimp only [contractLeftAux_apply_apply]
rw [LinearMap.smul_apply, smul_assoc, mul_smul_comm, smul_sub]
#align clifford_algebra.contract_left CliffordAlgebra.contractLeft
def contractRight : CliffordAlgebra Q →ₗ[R] Module.Dual R M →ₗ[R] CliffordAlgebra Q :=
LinearMap.flip (LinearMap.compl₂ (LinearMap.compr₂ contractLeft reverse) reverse)
#align clifford_algebra.contract_right CliffordAlgebra.contractRight
theorem contractRight_eq (x : CliffordAlgebra Q) :
contractRight (Q := Q) x d = reverse (contractLeft (R := R) (M := M) d <| reverse x) :=
rfl
#align clifford_algebra.contract_right_eq CliffordAlgebra.contractRight_eq
local infixl:70 "⌋" => contractLeft (R := R) (M := M)
local infixl:70 "⌊" => contractRight (R := R) (M := M) (Q := Q)
-- Porting note: Lean needs to be reminded of this instance otherwise the statement of the
-- next result times out
instance : SMul R (CliffordAlgebra Q) := inferInstance
theorem contractLeft_ι_mul (a : M) (b : CliffordAlgebra Q) :
d⌋(ι Q a * b) = d a • b - ι Q a * (d⌋b) := by
-- Porting note: Lean cannot figure out anymore the third argument
refine foldr'_ι_mul _ _ ?_ _ _ _
exact fun m x fx ↦ contractLeftAux_contractLeftAux Q d m x fx
#align clifford_algebra.contract_left_ι_mul CliffordAlgebra.contractLeft_ι_mul
theorem contractRight_mul_ι (a : M) (b : CliffordAlgebra Q) :
b * ι Q a⌊d = d a • b - b⌊d * ι Q a := by
rw [contractRight_eq, reverse.map_mul, reverse_ι, contractLeft_ι_mul, map_sub, map_smul,
reverse_reverse, reverse.map_mul, reverse_ι, contractRight_eq]
#align clifford_algebra.contract_right_mul_ι CliffordAlgebra.contractRight_mul_ι
theorem contractLeft_algebraMap_mul (r : R) (b : CliffordAlgebra Q) :
d⌋(algebraMap _ _ r * b) = algebraMap _ _ r * (d⌋b) := by
rw [← Algebra.smul_def, map_smul, Algebra.smul_def]
#align clifford_algebra.contract_left_algebra_map_mul CliffordAlgebra.contractLeft_algebraMap_mul
theorem contractLeft_mul_algebraMap (a : CliffordAlgebra Q) (r : R) :
d⌋(a * algebraMap _ _ r) = d⌋a * algebraMap _ _ r := by
rw [← Algebra.commutes, contractLeft_algebraMap_mul, Algebra.commutes]
#align clifford_algebra.contract_left_mul_algebra_map CliffordAlgebra.contractLeft_mul_algebraMap
theorem contractRight_algebraMap_mul (r : R) (b : CliffordAlgebra Q) :
algebraMap _ _ r * b⌊d = algebraMap _ _ r * (b⌊d) := by
rw [← Algebra.smul_def, LinearMap.map_smul₂, Algebra.smul_def]
#align clifford_algebra.contract_right_algebra_map_mul CliffordAlgebra.contractRight_algebraMap_mul
theorem contractRight_mul_algebraMap (a : CliffordAlgebra Q) (r : R) :
a * algebraMap _ _ r⌊d = a⌊d * algebraMap _ _ r := by
rw [← Algebra.commutes, contractRight_algebraMap_mul, Algebra.commutes]
#align clifford_algebra.contract_right_mul_algebra_map CliffordAlgebra.contractRight_mul_algebraMap
variable (Q)
@[simp]
theorem contractLeft_ι (x : M) : d⌋ι Q x = algebraMap R _ (d x) := by
-- Porting note: Lean cannot figure out anymore the third argument
refine (foldr'_ι _ _ ?_ _ _).trans <| by
simp_rw [contractLeftAux_apply_apply, mul_zero, sub_zero,
Algebra.algebraMap_eq_smul_one]
exact fun m x fx ↦ contractLeftAux_contractLeftAux Q d m x fx
#align clifford_algebra.contract_left_ι CliffordAlgebra.contractLeft_ι
@[simp]
| Mathlib/LinearAlgebra/CliffordAlgebra/Contraction.lean | 176 | 177 | theorem contractRight_ι (x : M) : ι Q x⌊d = algebraMap R _ (d x) := by |
rw [contractRight_eq, reverse_ι, contractLeft_ι, reverse.commutes]
|
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