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/-
Copyright (c) 2015 Microsoft Corporation. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Leonardo de Moura, Jeremy Avigad, Minchao Wu, Mario Carneiro
-/
import Mathlib.Data.Finset.Attach
import Mathlib.Data.Finset.Disjoint
import Mathlib.Data.Finset.Erase
import Mathlib.Data.Finset.Filter
import Mathlib.Data.Finset.Range
import Mathlib.Data.Finset.SDiff
import Mathlib.Data.Multiset.Basic
import Mathlib.Logic.Equiv.Set
import Mathlib.Order.Directed
import Mathlib.Order.Interval.Set.Defs
import Mathlib.Data.Set.SymmDiff
/-!
# Basic lemmas on finite sets
This file contains lemmas on the interaction of various definitions on the `Finset` type.
For an explanation of `Finset` design decisions, please see `Mathlib/Data/Finset/Defs.lean`.
## Main declarations
### Main definitions
* `Finset.choose`: Given a proof `h` of existence and uniqueness of a certain element
satisfying a predicate, `choose s h` returns the element of `s` satisfying that predicate.
### Equivalences between finsets
* The `Mathlib/Logic/Equiv/Defs.lean` file describes a general type of equivalence, so look in there
for any lemmas. There is some API for rewriting sums and products from `s` to `t` given that
`s ≃ t`.
TODO: examples
## Tags
finite sets, finset
-/
-- Assert that we define `Finset` without the material on `List.sublists`.
-- Note that we cannot use `List.sublists` itself as that is defined very early.
assert_not_exists List.sublistsLen Multiset.powerset CompleteLattice Monoid
open Multiset Subtype Function
universe u
variable {α : Type*} {β : Type*} {γ : Type*}
namespace Finset
-- TODO: these should be global attributes, but this will require fixing other files
attribute [local trans] Subset.trans Superset.trans
set_option linter.deprecated false in
@[deprecated "Deprecated without replacement." (since := "2025-02-07")]
theorem sizeOf_lt_sizeOf_of_mem [SizeOf α] {x : α} {s : Finset α} (hx : x ∈ s) :
SizeOf.sizeOf x < SizeOf.sizeOf s := by
cases s
dsimp [SizeOf.sizeOf, SizeOf.sizeOf, Multiset.sizeOf]
rw [Nat.add_comm]
refine lt_trans ?_ (Nat.lt_succ_self _)
exact Multiset.sizeOf_lt_sizeOf_of_mem hx
/-! ### Lattice structure -/
section Lattice
variable [DecidableEq α] {s s₁ s₂ t t₁ t₂ u v : Finset α} {a b : α}
/-! #### union -/
@[simp]
theorem disjUnion_eq_union (s t h) : @disjUnion α s t h = s ∪ t :=
ext fun a => by simp
@[simp]
theorem disjoint_union_left : Disjoint (s ∪ t) u ↔ Disjoint s u ∧ Disjoint t u := by
simp only [disjoint_left, mem_union, or_imp, forall_and]
@[simp]
theorem disjoint_union_right : Disjoint s (t ∪ u) ↔ Disjoint s t ∧ Disjoint s u := by
simp only [disjoint_right, mem_union, or_imp, forall_and]
/-! #### inter -/
theorem not_disjoint_iff_nonempty_inter : ¬Disjoint s t ↔ (s ∩ t).Nonempty :=
not_disjoint_iff.trans <| by simp [Finset.Nonempty]
alias ⟨_, Nonempty.not_disjoint⟩ := not_disjoint_iff_nonempty_inter
theorem disjoint_or_nonempty_inter (s t : Finset α) : Disjoint s t ∨ (s ∩ t).Nonempty := by
rw [← not_disjoint_iff_nonempty_inter]
exact em _
omit [DecidableEq α] in
theorem disjoint_of_subset_iff_left_eq_empty (h : s ⊆ t) :
Disjoint s t ↔ s = ∅ :=
disjoint_of_le_iff_left_eq_bot h
lemma pairwiseDisjoint_iff {ι : Type*} {s : Set ι} {f : ι → Finset α} :
s.PairwiseDisjoint f ↔ ∀ ⦃i⦄, i ∈ s → ∀ ⦃j⦄, j ∈ s → (f i ∩ f j).Nonempty → i = j := by
simp [Set.PairwiseDisjoint, Set.Pairwise, Function.onFun, not_imp_comm (a := _ = _),
not_disjoint_iff_nonempty_inter]
end Lattice
instance isDirected_le : IsDirected (Finset α) (· ≤ ·) := by classical infer_instance
instance isDirected_subset : IsDirected (Finset α) (· ⊆ ·) := isDirected_le
/-! ### erase -/
section Erase
variable [DecidableEq α] {s t u v : Finset α} {a b : α}
@[simp]
theorem erase_empty (a : α) : erase ∅ a = ∅ :=
rfl
protected lemma Nontrivial.erase_nonempty (hs : s.Nontrivial) : (s.erase a).Nonempty :=
(hs.exists_ne a).imp <| by aesop
@[simp] lemma erase_nonempty (ha : a ∈ s) : (s.erase a).Nonempty ↔ s.Nontrivial := by
simp only [Finset.Nonempty, mem_erase, and_comm (b := _ ∈ _)]
refine ⟨?_, fun hs ↦ hs.exists_ne a⟩
rintro ⟨b, hb, hba⟩
exact ⟨_, hb, _, ha, hba⟩
@[simp]
theorem erase_singleton (a : α) : ({a} : Finset α).erase a = ∅ := by
ext x
simp
@[simp]
theorem erase_insert_eq_erase (s : Finset α) (a : α) : (insert a s).erase a = s.erase a :=
ext fun x => by
simp +contextual only [mem_erase, mem_insert, and_congr_right_iff,
false_or, iff_self, imp_true_iff]
theorem erase_insert {a : α} {s : Finset α} (h : a ∉ s) : erase (insert a s) a = s := by
rw [erase_insert_eq_erase, erase_eq_of_not_mem h]
theorem erase_insert_of_ne {a b : α} {s : Finset α} (h : a ≠ b) :
erase (insert a s) b = insert a (erase s b) :=
ext fun x => by
have : x ≠ b ∧ x = a ↔ x = a := and_iff_right_of_imp fun hx => hx.symm ▸ h
simp only [mem_erase, mem_insert, and_or_left, this]
theorem erase_cons_of_ne {a b : α} {s : Finset α} (ha : a ∉ s) (hb : a ≠ b) :
erase (cons a s ha) b = cons a (erase s b) fun h => ha <| erase_subset _ _ h := by
simp only [cons_eq_insert, erase_insert_of_ne hb]
@[simp] theorem insert_erase (h : a ∈ s) : insert a (erase s a) = s :=
ext fun x => by
simp only [mem_insert, mem_erase, or_and_left, dec_em, true_and]
apply or_iff_right_of_imp
rintro rfl
exact h
lemma erase_eq_iff_eq_insert (hs : a ∈ s) (ht : a ∉ t) : erase s a = t ↔ s = insert a t := by
aesop
lemma insert_erase_invOn :
Set.InvOn (insert a) (fun s ↦ erase s a) {s : Finset α | a ∈ s} {s : Finset α | a ∉ s} :=
⟨fun _s ↦ insert_erase, fun _s ↦ erase_insert⟩
theorem erase_ssubset {a : α} {s : Finset α} (h : a ∈ s) : s.erase a ⊂ s :=
calc
s.erase a ⊂ insert a (s.erase a) := ssubset_insert <| not_mem_erase _ _
_ = _ := insert_erase h
theorem ssubset_iff_exists_subset_erase {s t : Finset α} : s ⊂ t ↔ ∃ a ∈ t, s ⊆ t.erase a := by
refine ⟨fun h => ?_, fun ⟨a, ha, h⟩ => ssubset_of_subset_of_ssubset h <| erase_ssubset ha⟩
obtain ⟨a, ht, hs⟩ := not_subset.1 h.2
exact ⟨a, ht, subset_erase.2 ⟨h.1, hs⟩⟩
theorem erase_ssubset_insert (s : Finset α) (a : α) : s.erase a ⊂ insert a s :=
ssubset_iff_exists_subset_erase.2
⟨a, mem_insert_self _ _, erase_subset_erase _ <| subset_insert _ _⟩
theorem erase_cons {s : Finset α} {a : α} (h : a ∉ s) : (s.cons a h).erase a = s := by
rw [cons_eq_insert, erase_insert_eq_erase, erase_eq_of_not_mem h]
theorem subset_insert_iff {a : α} {s t : Finset α} : s ⊆ insert a t ↔ erase s a ⊆ t := by
simp only [subset_iff, or_iff_not_imp_left, mem_erase, mem_insert, and_imp]
exact forall_congr' fun x => forall_swap
theorem erase_insert_subset (a : α) (s : Finset α) : erase (insert a s) a ⊆ s :=
subset_insert_iff.1 <| Subset.rfl
theorem insert_erase_subset (a : α) (s : Finset α) : s ⊆ insert a (erase s a) :=
subset_insert_iff.2 <| Subset.rfl
theorem subset_insert_iff_of_not_mem (h : a ∉ s) : s ⊆ insert a t ↔ s ⊆ t := by
rw [subset_insert_iff, erase_eq_of_not_mem h]
theorem erase_subset_iff_of_mem (h : a ∈ t) : s.erase a ⊆ t ↔ s ⊆ t := by
rw [← subset_insert_iff, insert_eq_of_mem h]
theorem erase_injOn' (a : α) : { s : Finset α | a ∈ s }.InjOn fun s => erase s a :=
fun s hs t ht (h : s.erase a = _) => by rw [← insert_erase hs, ← insert_erase ht, h]
end Erase
lemma Nontrivial.exists_cons_eq {s : Finset α} (hs : s.Nontrivial) :
∃ t a ha b hb hab, (cons b t hb).cons a (mem_cons.not.2 <| not_or_intro hab ha) = s := by
classical
obtain ⟨a, ha, b, hb, hab⟩ := hs
have : b ∈ s.erase a := mem_erase.2 ⟨hab.symm, hb⟩
refine ⟨(s.erase a).erase b, a, ?_, b, ?_, ?_, ?_⟩ <;>
simp [insert_erase this, insert_erase ha, *]
/-! ### sdiff -/
section Sdiff
variable [DecidableEq α] {s t u v : Finset α} {a b : α}
lemma erase_sdiff_erase (hab : a ≠ b) (hb : b ∈ s) : s.erase a \ s.erase b = {b} := by
ext; aesop
-- TODO: Do we want to delete this lemma and `Finset.disjUnion_singleton`,
-- or instead add `Finset.union_singleton`/`Finset.singleton_union`?
theorem sdiff_singleton_eq_erase (a : α) (s : Finset α) : s \ {a} = erase s a := by
ext
rw [mem_erase, mem_sdiff, mem_singleton, and_comm]
-- This lemma matches `Finset.insert_eq` in functionality.
theorem erase_eq (s : Finset α) (a : α) : s.erase a = s \ {a} :=
(sdiff_singleton_eq_erase _ _).symm
theorem disjoint_erase_comm : Disjoint (s.erase a) t ↔ Disjoint s (t.erase a) := by
simp_rw [erase_eq, disjoint_sdiff_comm]
lemma disjoint_insert_erase (ha : a ∉ t) : Disjoint (s.erase a) (insert a t) ↔ Disjoint s t := by
rw [disjoint_erase_comm, erase_insert ha]
lemma disjoint_erase_insert (ha : a ∉ s) : Disjoint (insert a s) (t.erase a) ↔ Disjoint s t := by
rw [← disjoint_erase_comm, erase_insert ha]
theorem disjoint_of_erase_left (ha : a ∉ t) (hst : Disjoint (s.erase a) t) : Disjoint s t := by
rw [← erase_insert ha, ← disjoint_erase_comm, disjoint_insert_right]
exact ⟨not_mem_erase _ _, hst⟩
theorem disjoint_of_erase_right (ha : a ∉ s) (hst : Disjoint s (t.erase a)) : Disjoint s t := by
rw [← erase_insert ha, disjoint_erase_comm, disjoint_insert_left]
exact ⟨not_mem_erase _ _, hst⟩
theorem inter_erase (a : α) (s t : Finset α) : s ∩ t.erase a = (s ∩ t).erase a := by
simp only [erase_eq, inter_sdiff_assoc]
@[simp]
theorem erase_inter (a : α) (s t : Finset α) : s.erase a ∩ t = (s ∩ t).erase a := by
simpa only [inter_comm t] using inter_erase a t s
theorem erase_sdiff_comm (s t : Finset α) (a : α) : s.erase a \ t = (s \ t).erase a := by
simp_rw [erase_eq, sdiff_right_comm]
theorem erase_inter_comm (s t : Finset α) (a : α) : s.erase a ∩ t = s ∩ t.erase a := by
rw [erase_inter, inter_erase]
theorem erase_union_distrib (s t : Finset α) (a : α) : (s ∪ t).erase a = s.erase a ∪ t.erase a := by
simp_rw [erase_eq, union_sdiff_distrib]
theorem insert_inter_distrib (s t : Finset α) (a : α) :
insert a (s ∩ t) = insert a s ∩ insert a t := by simp_rw [insert_eq, union_inter_distrib_left]
theorem erase_sdiff_distrib (s t : Finset α) (a : α) : (s \ t).erase a = s.erase a \ t.erase a := by
simp_rw [erase_eq, sdiff_sdiff, sup_sdiff_eq_sup le_rfl, sup_comm]
theorem erase_union_of_mem (ha : a ∈ t) (s : Finset α) : s.erase a ∪ t = s ∪ t := by
rw [← insert_erase (mem_union_right s ha), erase_union_distrib, ← union_insert, insert_erase ha]
theorem union_erase_of_mem (ha : a ∈ s) (t : Finset α) : s ∪ t.erase a = s ∪ t := by
rw [← insert_erase (mem_union_left t ha), erase_union_distrib, ← insert_union, insert_erase ha]
theorem sdiff_union_erase_cancel (hts : t ⊆ s) (ha : a ∈ t) : s \ t ∪ t.erase a = s.erase a := by
simp_rw [erase_eq, sdiff_union_sdiff_cancel hts (singleton_subset_iff.2 ha)]
theorem sdiff_insert (s t : Finset α) (x : α) : s \ insert x t = (s \ t).erase x := by
simp_rw [← sdiff_singleton_eq_erase, insert_eq, sdiff_sdiff_left', sdiff_union_distrib,
inter_comm]
theorem sdiff_insert_insert_of_mem_of_not_mem {s t : Finset α} {x : α} (hxs : x ∈ s) (hxt : x ∉ t) :
insert x (s \ insert x t) = s \ t := by
rw [sdiff_insert, insert_erase (mem_sdiff.mpr ⟨hxs, hxt⟩)]
theorem sdiff_erase (h : a ∈ s) : s \ t.erase a = insert a (s \ t) := by
rw [← sdiff_singleton_eq_erase, sdiff_sdiff_eq_sdiff_union (singleton_subset_iff.2 h), insert_eq,
union_comm]
theorem sdiff_erase_self (ha : a ∈ s) : s \ s.erase a = {a} := by
rw [sdiff_erase ha, Finset.sdiff_self, insert_empty_eq]
theorem erase_eq_empty_iff (s : Finset α) (a : α) : s.erase a = ∅ ↔ s = ∅ ∨ s = {a} := by
rw [← sdiff_singleton_eq_erase, sdiff_eq_empty_iff_subset, subset_singleton_iff]
--TODO@Yaël: Kill lemmas duplicate with `BooleanAlgebra`
theorem sdiff_disjoint : Disjoint (t \ s) s :=
disjoint_left.2 fun _a ha => (mem_sdiff.1 ha).2
theorem disjoint_sdiff : Disjoint s (t \ s) :=
sdiff_disjoint.symm
theorem disjoint_sdiff_inter (s t : Finset α) : Disjoint (s \ t) (s ∩ t) :=
disjoint_of_subset_right inter_subset_right sdiff_disjoint
end Sdiff
/-! ### attach -/
@[simp]
theorem attach_empty : attach (∅ : Finset α) = ∅ :=
rfl
@[simp]
theorem attach_nonempty_iff {s : Finset α} : s.attach.Nonempty ↔ s.Nonempty := by
simp [Finset.Nonempty]
@[aesop safe apply (rule_sets := [finsetNonempty])]
protected alias ⟨_, Nonempty.attach⟩ := attach_nonempty_iff
@[simp]
theorem attach_eq_empty_iff {s : Finset α} : s.attach = ∅ ↔ s = ∅ := by
simp [eq_empty_iff_forall_not_mem]
/-! ### filter -/
section Filter
variable (p q : α → Prop) [DecidablePred p] [DecidablePred q] {s t : Finset α}
theorem filter_singleton (a : α) : filter p {a} = if p a then {a} else ∅ := by
classical
ext x
simp only [mem_singleton, forall_eq, mem_filter]
split_ifs with h <;> by_cases h' : x = a <;> simp [h, h']
theorem filter_cons_of_pos (a : α) (s : Finset α) (ha : a ∉ s) (hp : p a) :
filter p (cons a s ha) = cons a (filter p s) ((mem_of_mem_filter _).mt ha) :=
eq_of_veq <| Multiset.filter_cons_of_pos s.val hp
theorem filter_cons_of_neg (a : α) (s : Finset α) (ha : a ∉ s) (hp : ¬p a) :
filter p (cons a s ha) = filter p s :=
eq_of_veq <| Multiset.filter_cons_of_neg s.val hp
theorem disjoint_filter {s : Finset α} {p q : α → Prop} [DecidablePred p] [DecidablePred q] :
Disjoint (s.filter p) (s.filter q) ↔ ∀ x ∈ s, p x → ¬q x := by
constructor <;> simp +contextual [disjoint_left]
theorem disjoint_filter_filter' (s t : Finset α)
{p q : α → Prop} [DecidablePred p] [DecidablePred q] (h : Disjoint p q) :
Disjoint (s.filter p) (t.filter q) := by
simp_rw [disjoint_left, mem_filter]
rintro a ⟨_, hp⟩ ⟨_, hq⟩
rw [Pi.disjoint_iff] at h
simpa [hp, hq] using h a
theorem disjoint_filter_filter_neg (s t : Finset α) (p : α → Prop)
[DecidablePred p] [∀ x, Decidable (¬p x)] :
Disjoint (s.filter p) (t.filter fun a => ¬p a) :=
disjoint_filter_filter' s t disjoint_compl_right
theorem filter_disj_union (s : Finset α) (t : Finset α) (h : Disjoint s t) :
filter p (disjUnion s t h) = (filter p s).disjUnion (filter p t) (disjoint_filter_filter h) :=
eq_of_veq <| Multiset.filter_add _ _ _
theorem filter_cons {a : α} (s : Finset α) (ha : a ∉ s) :
filter p (cons a s ha) =
if p a then cons a (filter p s) ((mem_of_mem_filter _).mt ha) else filter p s := by
split_ifs with h
· rw [filter_cons_of_pos _ _ _ ha h]
· rw [filter_cons_of_neg _ _ _ ha h]
section
variable [DecidableEq α]
theorem filter_union (s₁ s₂ : Finset α) : (s₁ ∪ s₂).filter p = s₁.filter p ∪ s₂.filter p :=
ext fun _ => by simp only [mem_filter, mem_union, or_and_right]
theorem filter_union_right (s : Finset α) : s.filter p ∪ s.filter q = s.filter fun x => p x ∨ q x :=
ext fun x => by simp [mem_filter, mem_union, ← and_or_left]
theorem filter_mem_eq_inter {s t : Finset α} [∀ i, Decidable (i ∈ t)] :
(s.filter fun i => i ∈ t) = s ∩ t :=
ext fun i => by simp [mem_filter, mem_inter]
theorem filter_inter_distrib (s t : Finset α) : (s ∩ t).filter p = s.filter p ∩ t.filter p := by
ext
simp [mem_filter, mem_inter, and_assoc]
theorem filter_inter (s t : Finset α) : filter p s ∩ t = filter p (s ∩ t) := by
ext
simp only [mem_inter, mem_filter, and_right_comm]
theorem inter_filter (s t : Finset α) : s ∩ filter p t = filter p (s ∩ t) := by
rw [inter_comm, filter_inter, inter_comm]
theorem filter_insert (a : α) (s : Finset α) :
filter p (insert a s) = if p a then insert a (filter p s) else filter p s := by
ext x
split_ifs with h <;> by_cases h' : x = a <;> simp [h, h']
theorem filter_erase (a : α) (s : Finset α) : filter p (erase s a) = erase (filter p s) a := by
ext x
simp only [and_assoc, mem_filter, iff_self, mem_erase]
theorem filter_or (s : Finset α) : (s.filter fun a => p a ∨ q a) = s.filter p ∪ s.filter q :=
ext fun _ => by simp [mem_filter, mem_union, and_or_left]
theorem filter_and (s : Finset α) : (s.filter fun a => p a ∧ q a) = s.filter p ∩ s.filter q :=
ext fun _ => by simp [mem_filter, mem_inter, and_comm, and_left_comm, and_self_iff, and_assoc]
theorem filter_not (s : Finset α) : (s.filter fun a => ¬p a) = s \ s.filter p :=
ext fun a => by
simp only [Bool.decide_coe, Bool.not_eq_true', mem_filter, and_comm, mem_sdiff, not_and_or,
Bool.not_eq_true, and_or_left, and_not_self, or_false]
lemma filter_and_not (s : Finset α) (p q : α → Prop) [DecidablePred p] [DecidablePred q] :
s.filter (fun a ↦ p a ∧ ¬ q a) = s.filter p \ s.filter q := by
rw [filter_and, filter_not, ← inter_sdiff_assoc, inter_eq_left.2 (filter_subset _ _)]
theorem sdiff_eq_filter (s₁ s₂ : Finset α) : s₁ \ s₂ = filter (· ∉ s₂) s₁ :=
ext fun _ => by simp [mem_sdiff, mem_filter]
theorem subset_union_elim {s : Finset α} {t₁ t₂ : Set α} (h : ↑s ⊆ t₁ ∪ t₂) :
∃ s₁ s₂ : Finset α, s₁ ∪ s₂ = s ∧ ↑s₁ ⊆ t₁ ∧ ↑s₂ ⊆ t₂ \ t₁ := by
classical
refine ⟨s.filter (· ∈ t₁), s.filter (· ∉ t₁), ?_, ?_, ?_⟩
· simp [filter_union_right, em]
· intro x
simp
· intro x
simp only [not_not, coe_filter, Set.mem_setOf_eq, Set.mem_diff, and_imp]
intro hx hx₂
exact ⟨Or.resolve_left (h hx) hx₂, hx₂⟩
-- This is not a good simp lemma, as it would prevent `Finset.mem_filter` from firing
-- on, e.g. `x ∈ s.filter (Eq b)`.
/-- After filtering out everything that does not equal a given value, at most that value remains.
This is equivalent to `filter_eq'` with the equality the other way.
-/
theorem filter_eq [DecidableEq β] (s : Finset β) (b : β) :
s.filter (Eq b) = ite (b ∈ s) {b} ∅ := by
split_ifs with h
· ext
simp only [mem_filter, mem_singleton, decide_eq_true_eq]
refine ⟨fun h => h.2.symm, ?_⟩
rintro rfl
exact ⟨h, rfl⟩
· ext
simp only [mem_filter, not_and, iff_false, not_mem_empty, decide_eq_true_eq]
rintro m rfl
exact h m
/-- After filtering out everything that does not equal a given value, at most that value remains.
This is equivalent to `filter_eq` with the equality the other way.
-/
theorem filter_eq' [DecidableEq β] (s : Finset β) (b : β) :
(s.filter fun a => a = b) = ite (b ∈ s) {b} ∅ :=
_root_.trans (filter_congr fun _ _ => by simp_rw [@eq_comm _ b]) (filter_eq s b)
theorem filter_ne [DecidableEq β] (s : Finset β) (b : β) :
(s.filter fun a => b ≠ a) = s.erase b := by
ext
simp only [mem_filter, mem_erase, Ne, decide_not, Bool.not_eq_true', decide_eq_false_iff_not]
tauto
theorem filter_ne' [DecidableEq β] (s : Finset β) (b : β) : (s.filter fun a => a ≠ b) = s.erase b :=
_root_.trans (filter_congr fun _ _ => by simp_rw [@ne_comm _ b]) (filter_ne s b)
theorem filter_union_filter_of_codisjoint (s : Finset α) (h : Codisjoint p q) :
s.filter p ∪ s.filter q = s :=
(filter_or _ _ _).symm.trans <| filter_true_of_mem fun x _ => h.top_le x trivial
theorem filter_union_filter_neg_eq [∀ x, Decidable (¬p x)] (s : Finset α) :
(s.filter p ∪ s.filter fun a => ¬p a) = s :=
filter_union_filter_of_codisjoint _ _ _ <| @codisjoint_hnot_right _ _ p
end
end Filter
/-! ### range -/
section Range
open Nat
variable {n m l : ℕ}
@[simp]
theorem range_filter_eq {n m : ℕ} : (range n).filter (· = m) = if m < n then {m} else ∅ := by
convert filter_eq (range n) m using 2
· ext
rw [eq_comm]
· simp
end Range
end Finset
/-! ### dedup on list and multiset -/
namespace Multiset
variable [DecidableEq α] {s t : Multiset α}
@[simp]
theorem toFinset_add (s t : Multiset α) : toFinset (s + t) = toFinset s ∪ toFinset t :=
Finset.ext <| by simp
@[simp]
theorem toFinset_inter (s t : Multiset α) : toFinset (s ∩ t) = toFinset s ∩ toFinset t :=
Finset.ext <| by simp
@[simp]
theorem toFinset_union (s t : Multiset α) : (s ∪ t).toFinset = s.toFinset ∪ t.toFinset := by
ext; simp
@[simp]
theorem toFinset_eq_empty {m : Multiset α} : m.toFinset = ∅ ↔ m = 0 :=
Finset.val_inj.symm.trans Multiset.dedup_eq_zero
@[simp]
theorem toFinset_nonempty : s.toFinset.Nonempty ↔ s ≠ 0 := by
simp only [toFinset_eq_empty, Ne, Finset.nonempty_iff_ne_empty]
@[aesop safe apply (rule_sets := [finsetNonempty])]
protected alias ⟨_, Aesop.toFinset_nonempty_of_ne⟩ := toFinset_nonempty
@[simp]
theorem toFinset_filter (s : Multiset α) (p : α → Prop) [DecidablePred p] :
Multiset.toFinset (s.filter p) = s.toFinset.filter p := by
ext; simp
end Multiset
namespace List
variable [DecidableEq α] {l l' : List α} {a : α} {f : α → β}
{s : Finset α} {t : Set β} {t' : Finset β}
@[simp]
theorem toFinset_union (l l' : List α) : (l ∪ l').toFinset = l.toFinset ∪ l'.toFinset := by
ext
simp
@[simp]
theorem toFinset_inter (l l' : List α) : (l ∩ l').toFinset = l.toFinset ∩ l'.toFinset := by
ext
simp
@[aesop safe apply (rule_sets := [finsetNonempty])]
alias ⟨_, Aesop.toFinset_nonempty_of_ne⟩ := toFinset_nonempty_iff
@[simp]
theorem toFinset_filter (s : List α) (p : α → Bool) :
(s.filter p).toFinset = s.toFinset.filter (p ·) := by
ext; simp [List.mem_filter]
end List
namespace Finset
section ToList
@[simp]
theorem toList_eq_nil {s : Finset α} : s.toList = [] ↔ s = ∅ :=
Multiset.toList_eq_nil.trans val_eq_zero
theorem empty_toList {s : Finset α} : s.toList.isEmpty ↔ s = ∅ := by simp
@[simp]
theorem toList_empty : (∅ : Finset α).toList = [] :=
toList_eq_nil.mpr rfl
theorem Nonempty.toList_ne_nil {s : Finset α} (hs : s.Nonempty) : s.toList ≠ [] :=
mt toList_eq_nil.mp hs.ne_empty
theorem Nonempty.not_empty_toList {s : Finset α} (hs : s.Nonempty) : ¬s.toList.isEmpty :=
mt empty_toList.mp hs.ne_empty
end ToList
/-! ### choose -/
section Choose
variable (p : α → Prop) [DecidablePred p] (l : Finset α)
/-- Given a finset `l` and a predicate `p`, associate to a proof that there is a unique element of
`l` satisfying `p` this unique element, as an element of the corresponding subtype. -/
def chooseX (hp : ∃! a, a ∈ l ∧ p a) : { a // a ∈ l ∧ p a } :=
Multiset.chooseX p l.val hp
/-- Given a finset `l` and a predicate `p`, associate to a proof that there is a unique element of
`l` satisfying `p` this unique element, as an element of the ambient type. -/
def choose (hp : ∃! a, a ∈ l ∧ p a) : α :=
chooseX p l hp
theorem choose_spec (hp : ∃! a, a ∈ l ∧ p a) : choose p l hp ∈ l ∧ p (choose p l hp) :=
(chooseX p l hp).property
theorem choose_mem (hp : ∃! a, a ∈ l ∧ p a) : choose p l hp ∈ l :=
(choose_spec _ _ _).1
theorem choose_property (hp : ∃! a, a ∈ l ∧ p a) : p (choose p l hp) :=
(choose_spec _ _ _).2
end Choose
end Finset
namespace Equiv
variable [DecidableEq α] {s t : Finset α}
open Finset
/-- The disjoint union of finsets is a sum -/
def Finset.union (s t : Finset α) (h : Disjoint s t) :
s ⊕ t ≃ (s ∪ t : Finset α) :=
Equiv.setCongr (coe_union _ _) |>.trans (Equiv.Set.union (disjoint_coe.mpr h)) |>.symm
@[simp]
theorem Finset.union_symm_inl (h : Disjoint s t) (x : s) :
Equiv.Finset.union s t h (Sum.inl x) = ⟨x, Finset.mem_union.mpr <| Or.inl x.2⟩ :=
rfl
@[simp]
theorem Finset.union_symm_inr (h : Disjoint s t) (y : t) :
Equiv.Finset.union s t h (Sum.inr y) = ⟨y, Finset.mem_union.mpr <| Or.inr y.2⟩ :=
rfl
/-- The type of dependent functions on the disjoint union of finsets `s ∪ t` is equivalent to the
type of pairs of functions on `s` and on `t`. This is similar to `Equiv.sumPiEquivProdPi`. -/
def piFinsetUnion {ι} [DecidableEq ι] (α : ι → Type*) {s t : Finset ι} (h : Disjoint s t) :
((∀ i : s, α i) × ∀ i : t, α i) ≃ ∀ i : (s ∪ t : Finset ι), α i :=
let e := Equiv.Finset.union s t h
sumPiEquivProdPi (fun b ↦ α (e b)) |>.symm.trans (.piCongrLeft (fun i : ↥(s ∪ t) ↦ α i) e)
/-- A finset is equivalent to its coercion as a set. -/
def _root_.Finset.equivToSet (s : Finset α) : s ≃ s.toSet where
toFun a := ⟨a.1, mem_coe.2 a.2⟩
invFun a := ⟨a.1, mem_coe.1 a.2⟩
left_inv := fun _ ↦ rfl
right_inv := fun _ ↦ rfl
end Equiv
namespace Multiset
variable [DecidableEq α]
@[simp]
lemma toFinset_replicate (n : ℕ) (a : α) :
(replicate n a).toFinset = if n = 0 then ∅ else {a} := by
ext x
simp only [mem_toFinset, Finset.mem_singleton, mem_replicate]
split_ifs with hn <;> simp [hn]
end Multiset
| Mathlib/Data/Finset/Basic.lean | 1,647 | 1,648 | |
/-
Copyright (c) 2021 Sébastien Gouëzel. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Sébastien Gouëzel
-/
import Mathlib.MeasureTheory.Covering.Differentiation
/-!
# Besicovitch covering theorems
The topological Besicovitch covering theorem ensures that, in a nice metric space, there exists a
number `N` such that, from any family of balls with bounded radii, one can extract `N` families,
each made of disjoint balls, covering together all the centers of the initial family.
By "nice metric space", we mean a technical property stated as follows: there exists no satellite
configuration of `N + 1` points (with a given parameter `τ > 1`). Such a configuration is a family
of `N + 1` balls, where the first `N` balls all intersect the last one, but none of them contains
the center of another one and their radii are controlled. This property is for instance
satisfied by finite-dimensional real vector spaces.
In this file, we prove the topological Besicovitch covering theorem,
in `Besicovitch.exist_disjoint_covering_families`.
The measurable Besicovitch theorem ensures that, in the same class of metric spaces, if at every
point one considers a class of balls of arbitrarily small radii, called admissible balls, then
one can cover almost all the space by a family of disjoint admissible balls.
It is deduced from the topological Besicovitch theorem, and proved
in `Besicovitch.exists_disjoint_closedBall_covering_ae`.
This implies that balls of small radius form a Vitali family in such spaces. Therefore, theorems
on differentiation of measures hold as a consequence of general results. We restate them in this
context to make them more easily usable.
## Main definitions and results
* `SatelliteConfig α N τ` is the type of all satellite configurations of `N + 1` points
in the metric space `α`, with parameter `τ`.
* `HasBesicovitchCovering` is a class recording that there exist `N` and `τ > 1` such that
there is no satellite configuration of `N + 1` points with parameter `τ`.
* `exist_disjoint_covering_families` is the topological Besicovitch covering theorem: from any
family of balls one can extract finitely many disjoint subfamilies covering the same set.
* `exists_disjoint_closedBall_covering` is the measurable Besicovitch covering theorem: from any
family of balls with arbitrarily small radii at every point, one can extract countably many
disjoint balls covering almost all the space. While the value of `N` is relevant for the precise
statement of the topological Besicovitch theorem, it becomes irrelevant for the measurable one.
Therefore, this statement is expressed using the `Prop`-valued
typeclass `HasBesicovitchCovering`.
We also restate the following specialized versions of general theorems on differentiation of
measures:
* `Besicovitch.ae_tendsto_rnDeriv` ensures that `ρ (closedBall x r) / μ (closedBall x r)` tends
almost surely to the Radon-Nikodym derivative of `ρ` with respect to `μ` at `x`.
* `Besicovitch.ae_tendsto_measure_inter_div` states that almost every point in an arbitrary set `s`
is a Lebesgue density point, i.e., `μ (s ∩ closedBall x r) / μ (closedBall x r)` tends to `1` as
`r` tends to `0`. A stronger version for measurable sets is given in
`Besicovitch.ae_tendsto_measure_inter_div_of_measurableSet`.
## Implementation
#### Sketch of proof of the topological Besicovitch theorem:
We choose balls in a greedy way. First choose a ball with maximal radius (or rather, since there
is no guarantee the maximal radius is realized, a ball with radius within a factor `τ` of the
supremum). Then, remove all balls whose center is covered by the first ball, and choose among the
remaining ones a ball with radius close to maximum. Go on forever until there is no available
center (this is a transfinite induction in general).
Then define inductively a coloring of the balls. A ball will be of color `i` if it intersects
already chosen balls of color `0`, ..., `i - 1`, but none of color `i`. In this way, balls of the
same color form a disjoint family, and the space is covered by the families of the different colors.
The nontrivial part is to show that at most `N` colors are used. If one needs `N + 1` colors,
consider the first time this happens. Then the corresponding ball intersects `N` balls of the
different colors. Moreover, the inductive construction ensures that the radii of all the balls are
controlled: they form a satellite configuration with `N + 1` balls (essentially by definition of
satellite configurations). Since we assume that there are no such configurations, this is a
contradiction.
#### Sketch of proof of the measurable Besicovitch theorem:
From the topological Besicovitch theorem, one can find a disjoint countable family of balls
covering a proportion `> 1 / (N + 1)` of the space. Taking a large enough finite subset of these
balls, one gets the same property for finitely many balls. Their union is closed. Therefore, any
point in the complement has around it an admissible ball not intersecting these finitely many balls.
Applying again the topological Besicovitch theorem, one extracts from these a disjoint countable
subfamily covering a proportion `> 1 / (N + 1)` of the remaining points, and then even a disjoint
finite subfamily. Then one goes on again and again, covering at each step a positive proportion of
the remaining points, while remaining disjoint from the already chosen balls. The union of all these
balls is the desired almost everywhere covering.
-/
noncomputable section
universe u
open Metric Set Filter Fin MeasureTheory TopologicalSpace
open scoped Topology ENNReal MeasureTheory NNReal
/-!
### Satellite configurations
-/
/-- A satellite configuration is a configuration of `N+1` points that shows up in the inductive
construction for the Besicovitch covering theorem. It depends on some parameter `τ ≥ 1`.
This is a family of balls (indexed by `i : Fin N.succ`, with center `c i` and radius `r i`) such
that the last ball intersects all the other balls (condition `inter`),
and given any two balls there is an order between them, ensuring that the first ball does not
contain the center of the other one, and the radius of the second ball can not be larger than
the radius of the first ball (up to a factor `τ`). This order corresponds to the order of choice
in the inductive construction: otherwise, the second ball would have been chosen before.
This is the condition `h`.
Finally, the last ball is chosen after all the other ones, meaning that `h` can be strengthened
by keeping only one side of the alternative in `hlast`.
-/
structure Besicovitch.SatelliteConfig (α : Type*) [MetricSpace α] (N : ℕ) (τ : ℝ) where
/-- Centers of the balls -/
c : Fin N.succ → α
/-- Radii of the balls -/
r : Fin N.succ → ℝ
rpos : ∀ i, 0 < r i
h : Pairwise fun i j =>
r i ≤ dist (c i) (c j) ∧ r j ≤ τ * r i ∨ r j ≤ dist (c j) (c i) ∧ r i ≤ τ * r j
hlast : ∀ i < last N, r i ≤ dist (c i) (c (last N)) ∧ r (last N) ≤ τ * r i
inter : ∀ i < last N, dist (c i) (c (last N)) ≤ r i + r (last N)
namespace Mathlib.Meta.Positivity
open Lean Meta Qq
/-- Extension for the `positivity` tactic: `Besicovitch.SatelliteConfig.r`. -/
@[positivity Besicovitch.SatelliteConfig.r _ _]
def evalBesicovitchSatelliteConfigR : PositivityExt where eval {u α} _zα _pα e := do
match u, α, e with
| 0, ~q(ℝ), ~q(@Besicovitch.SatelliteConfig.r $β $inst $N $τ $self $i) =>
assertInstancesCommute
return .positive q(Besicovitch.SatelliteConfig.rpos $self $i)
| _, _, _ => throwError "not Besicovitch.SatelliteConfig.r"
end Mathlib.Meta.Positivity
/-- A metric space has the Besicovitch covering property if there exist `N` and `τ > 1` such that
there are no satellite configuration of parameter `τ` with `N+1` points. This is the condition that
guarantees that the measurable Besicovitch covering theorem holds. It is satisfied by
finite-dimensional real vector spaces. -/
class HasBesicovitchCovering (α : Type*) [MetricSpace α] : Prop where
no_satelliteConfig : ∃ (N : ℕ) (τ : ℝ), 1 < τ ∧ IsEmpty (Besicovitch.SatelliteConfig α N τ)
/-- There is always a satellite configuration with a single point. -/
instance Besicovitch.SatelliteConfig.instInhabited {α : Type*} {τ : ℝ}
[Inhabited α] [MetricSpace α] : Inhabited (Besicovitch.SatelliteConfig α 0 τ) :=
⟨{ c := default
r := fun _ => 1
rpos := fun _ => zero_lt_one
h := fun i j hij => (hij (Subsingleton.elim (α := Fin 1) i j)).elim
hlast := fun i hi => by
rw [Subsingleton.elim (α := Fin 1) i (last 0)] at hi; exact (lt_irrefl _ hi).elim
inter := fun i hi => by
rw [Subsingleton.elim (α := Fin 1) i (last 0)] at hi; exact (lt_irrefl _ hi).elim }⟩
namespace Besicovitch
namespace SatelliteConfig
variable {α : Type*} [MetricSpace α] {N : ℕ} {τ : ℝ} (a : SatelliteConfig α N τ)
theorem inter' (i : Fin N.succ) : dist (a.c i) (a.c (last N)) ≤ a.r i + a.r (last N) := by
rcases lt_or_le i (last N) with (H | H)
· exact a.inter i H
· have I : i = last N := top_le_iff.1 H
have := (a.rpos (last N)).le
simp only [I, add_nonneg this this, dist_self]
theorem hlast' (i : Fin N.succ) (h : 1 ≤ τ) : a.r (last N) ≤ τ * a.r i := by
rcases lt_or_le i (last N) with (H | H)
· exact (a.hlast i H).2
· have : i = last N := top_le_iff.1 H
rw [this]
exact le_mul_of_one_le_left (a.rpos _).le h
end SatelliteConfig
/-! ### Extracting disjoint subfamilies from a ball covering -/
/-- A ball package is a family of balls in a metric space with positive bounded radii. -/
structure BallPackage (β : Type*) (α : Type*) where
/-- Centers of the balls -/
c : β → α
/-- Radii of the balls -/
r : β → ℝ
rpos : ∀ b, 0 < r b
/-- Bound on the radii of the balls -/
r_bound : ℝ
r_le : ∀ b, r b ≤ r_bound
/-- The ball package made of unit balls. -/
def unitBallPackage (α : Type*) : BallPackage α α where
c := id
r _ := 1
rpos _ := zero_lt_one
r_bound := 1
r_le _ := le_rfl
instance BallPackage.instInhabited (α : Type*) : Inhabited (BallPackage α α) :=
⟨unitBallPackage α⟩
/-- A Besicovitch tau-package is a family of balls in a metric space with positive bounded radii,
together with enough data to proceed with the Besicovitch greedy algorithm. We register this in
a single structure to make sure that all our constructions in this algorithm only depend on
one variable. -/
structure TauPackage (β : Type*) (α : Type*) extends BallPackage β α where
/-- Parameter used by the Besicovitch greedy algorithm -/
τ : ℝ
one_lt_tau : 1 < τ
instance TauPackage.instInhabited (α : Type*) : Inhabited (TauPackage α α) :=
⟨{ unitBallPackage α with
τ := 2
one_lt_tau := one_lt_two }⟩
variable {α : Type*} [MetricSpace α] {β : Type u}
namespace TauPackage
variable [Nonempty β] (p : TauPackage β α)
/-- Choose inductively large balls with centers that are not contained in the union of already
chosen balls. This is a transfinite induction. -/
noncomputable def index : Ordinal.{u} → β
| i =>
-- `Z` is the set of points that are covered by already constructed balls
let Z := ⋃ j : { j // j < i }, ball (p.c (index j)) (p.r (index j))
-- `R` is the supremum of the radii of balls with centers not in `Z`
let R := iSup fun b : { b : β // p.c b ∉ Z } => p.r b
-- return an index `b` for which the center `c b` is not in `Z`, and the radius is at
-- least `R / τ`, if such an index exists (and garbage otherwise).
Classical.epsilon fun b : β => p.c b ∉ Z ∧ R ≤ p.τ * p.r b
termination_by i => i
decreasing_by exact j.2
/-- The set of points that are covered by the union of balls selected at steps `< i`. -/
def iUnionUpTo (i : Ordinal.{u}) : Set α :=
⋃ j : { j // j < i }, ball (p.c (p.index j)) (p.r (p.index j))
theorem monotone_iUnionUpTo : Monotone p.iUnionUpTo := by
intro i j hij
simp only [iUnionUpTo]
exact iUnion_mono' fun r => ⟨⟨r, r.2.trans_le hij⟩, Subset.rfl⟩
/-- Supremum of the radii of balls whose centers are not yet covered at step `i`. -/
def R (i : Ordinal.{u}) : ℝ :=
iSup fun b : { b : β // p.c b ∉ p.iUnionUpTo i } => p.r b
/-- Group the balls into disjoint families, by assigning to a ball the smallest color for which
it does not intersect any already chosen ball of this color. -/
noncomputable def color : Ordinal.{u} → ℕ
| i =>
let A : Set ℕ :=
⋃ (j : { j // j < i })
(_ : (closedBall (p.c (p.index j)) (p.r (p.index j)) ∩
closedBall (p.c (p.index i)) (p.r (p.index i))).Nonempty), {color j}
sInf (univ \ A)
termination_by i => i
decreasing_by exact j.2
/-- `p.lastStep` is the first ordinal where the construction stops making sense, i.e., `f` returns
garbage since there is no point left to be chosen. We will only use ordinals before this step. -/
def lastStep : Ordinal.{u} :=
sInf {i | ¬∃ b : β, p.c b ∉ p.iUnionUpTo i ∧ p.R i ≤ p.τ * p.r b}
theorem lastStep_nonempty :
{i | ¬∃ b : β, p.c b ∉ p.iUnionUpTo i ∧ p.R i ≤ p.τ * p.r b}.Nonempty := by
by_contra h
suffices H : Function.Injective p.index from not_injective_of_ordinal p.index H
intro x y hxy
wlog x_le_y : x ≤ y generalizing x y
· exact (this hxy.symm (le_of_not_le x_le_y)).symm
rcases eq_or_lt_of_le x_le_y with (rfl | H); · rfl
simp only [nonempty_def, not_exists, exists_prop, not_and, not_lt, not_le, mem_setOf_eq,
not_forall] at h
specialize h y
have A : p.c (p.index y) ∉ p.iUnionUpTo y := by
have :
p.index y =
Classical.epsilon fun b : β => p.c b ∉ p.iUnionUpTo y ∧ p.R y ≤ p.τ * p.r b := by
rw [TauPackage.index]; rfl
rw [this]
exact (Classical.epsilon_spec h).1
simp only [iUnionUpTo, not_exists, exists_prop, mem_iUnion, mem_closedBall, not_and, not_le,
Subtype.exists, Subtype.coe_mk] at A
specialize A x H
simp? [hxy] at A says simp only [hxy, mem_ball, dist_self, not_lt] at A
exact (lt_irrefl _ ((p.rpos (p.index y)).trans_le A)).elim
/-- Every point is covered by chosen balls, before `p.lastStep`. -/
theorem mem_iUnionUpTo_lastStep (x : β) : p.c x ∈ p.iUnionUpTo p.lastStep := by
have A : ∀ z : β, p.c z ∈ p.iUnionUpTo p.lastStep ∨ p.τ * p.r z < p.R p.lastStep := by
have : p.lastStep ∈ {i | ¬∃ b : β, p.c b ∉ p.iUnionUpTo i ∧ p.R i ≤ p.τ * p.r b} :=
csInf_mem p.lastStep_nonempty
simpa only [not_exists, mem_setOf_eq, not_and_or, not_le, not_not_mem]
by_contra h
rcases A x with (H | H); · exact h H
have Rpos : 0 < p.R p.lastStep := by
apply lt_trans (mul_pos (_root_.zero_lt_one.trans p.one_lt_tau) (p.rpos _)) H
have B : p.τ⁻¹ * p.R p.lastStep < p.R p.lastStep := by
conv_rhs => rw [← one_mul (p.R p.lastStep)]
exact mul_lt_mul (inv_lt_one_of_one_lt₀ p.one_lt_tau) le_rfl Rpos zero_le_one
obtain ⟨y, hy1, hy2⟩ : ∃ y, p.c y ∉ p.iUnionUpTo p.lastStep ∧ p.τ⁻¹ * p.R p.lastStep < p.r y := by
have := exists_lt_of_lt_csSup ?_ B
· simpa only [exists_prop, mem_range, exists_exists_and_eq_and, Subtype.exists,
Subtype.coe_mk]
rw [← image_univ, image_nonempty]
exact ⟨⟨_, h⟩, mem_univ _⟩
rcases A y with (Hy | Hy)
· exact hy1 Hy
· rw [← div_eq_inv_mul] at hy2
have := (div_le_iff₀' (_root_.zero_lt_one.trans p.one_lt_tau)).1 hy2.le
exact lt_irrefl _ (Hy.trans_le this)
/-- If there are no configurations of satellites with `N+1` points, one never uses more than `N`
distinct families in the Besicovitch inductive construction. -/
theorem color_lt {i : Ordinal.{u}} (hi : i < p.lastStep) {N : ℕ}
(hN : IsEmpty (SatelliteConfig α N p.τ)) : p.color i < N := by
/- By contradiction, consider the first ordinal `i` for which one would have `p.color i = N`.
Choose for each `k < N` a ball with color `k` that intersects the ball at color `i`
(there is such a ball, otherwise one would have used the color `k` and not `N`).
Then this family of `N+1` balls forms a satellite configuration, which is forbidden by
the assumption `hN`. -/
induction' i using Ordinal.induction with i IH
let A : Set ℕ :=
⋃ (j : { j // j < i })
(_ : (closedBall (p.c (p.index j)) (p.r (p.index j)) ∩
closedBall (p.c (p.index i)) (p.r (p.index i))).Nonempty),
{p.color j}
have color_i : p.color i = sInf (univ \ A) := by rw [color]
rw [color_i]
have N_mem : N ∈ univ \ A := by
simp only [A, not_exists, true_and, exists_prop, mem_iUnion, mem_singleton_iff,
mem_closedBall, not_and, mem_univ, mem_diff, Subtype.exists, Subtype.coe_mk]
intro j ji _
exact (IH j ji (ji.trans hi)).ne'
suffices sInf (univ \ A) ≠ N by
rcases (csInf_le (OrderBot.bddBelow (univ \ A)) N_mem).lt_or_eq with (H | H)
· exact H
· exact (this H).elim
intro Inf_eq_N
have :
∀ k, k < N → ∃ j, j < i ∧
(closedBall (p.c (p.index j)) (p.r (p.index j)) ∩
closedBall (p.c (p.index i)) (p.r (p.index i))).Nonempty ∧ k = p.color j := by
intro k hk
rw [← Inf_eq_N] at hk
have : k ∈ A := by
simpa only [true_and, mem_univ, Classical.not_not, mem_diff] using
Nat.not_mem_of_lt_sInf hk
simp only [mem_iUnion, mem_singleton_iff, exists_prop, Subtype.exists, exists_and_right,
and_assoc] at this
simpa only [A, exists_prop, mem_iUnion, mem_singleton_iff, mem_closedBall, Subtype.exists,
Subtype.coe_mk]
choose! g hg using this
-- Choose for each `k < N` an ordinal `G k < i` giving a ball of color `k` intersecting
-- the last ball.
let G : ℕ → Ordinal := fun n => if n = N then i else g n
have color_G : ∀ n, n ≤ N → p.color (G n) = n := by
intro n hn
rcases hn.eq_or_lt with (rfl | H)
· simp only [G]; simp only [color_i, Inf_eq_N, if_true, eq_self_iff_true]
· simp only [G]; simp only [H.ne, (hg n H).right.right.symm, if_false]
have G_lt_last : ∀ n, n ≤ N → G n < p.lastStep := by
intro n hn
rcases hn.eq_or_lt with (rfl | H)
· simp only [G]; simp only [hi, if_true, eq_self_iff_true]
· simp only [G]; simp only [H.ne, (hg n H).left.trans hi, if_false]
have fGn :
∀ n, n ≤ N →
p.c (p.index (G n)) ∉ p.iUnionUpTo (G n) ∧ p.R (G n) ≤ p.τ * p.r (p.index (G n)) := by
intro n hn
have :
p.index (G n) =
Classical.epsilon fun t => p.c t ∉ p.iUnionUpTo (G n) ∧ p.R (G n) ≤ p.τ * p.r t := by
rw [index]; rfl
rw [this]
have : ∃ t, p.c t ∉ p.iUnionUpTo (G n) ∧ p.R (G n) ≤ p.τ * p.r t := by
simpa only [not_exists, exists_prop, not_and, not_lt, not_le, mem_setOf_eq, not_forall] using
not_mem_of_lt_csInf (G_lt_last n hn) (OrderBot.bddBelow _)
exact Classical.epsilon_spec this
-- the balls with indices `G k` satisfy the characteristic property of satellite configurations.
have Gab :
∀ a b : Fin (Nat.succ N),
G a < G b →
p.r (p.index (G a)) ≤ dist (p.c (p.index (G a))) (p.c (p.index (G b))) ∧
p.r (p.index (G b)) ≤ p.τ * p.r (p.index (G a)) := by
intro a b G_lt
have ha : (a : ℕ) ≤ N := Nat.lt_succ_iff.1 a.2
have hb : (b : ℕ) ≤ N := Nat.lt_succ_iff.1 b.2
constructor
· have := (fGn b hb).1
simp only [iUnionUpTo, not_exists, exists_prop, mem_iUnion, mem_closedBall, not_and, not_le,
Subtype.exists, Subtype.coe_mk] at this
simpa only [dist_comm, mem_ball, not_lt] using this (G a) G_lt
· apply le_trans _ (fGn a ha).2
have B : p.c (p.index (G b)) ∉ p.iUnionUpTo (G a) := by
intro H; exact (fGn b hb).1 (p.monotone_iUnionUpTo G_lt.le H)
let b' : { t // p.c t ∉ p.iUnionUpTo (G a) } := ⟨p.index (G b), B⟩
apply @le_ciSup _ _ _ (fun t : { t // p.c t ∉ p.iUnionUpTo (G a) } => p.r t) _ b'
refine ⟨p.r_bound, fun t ht => ?_⟩
simp only [exists_prop, mem_range, Subtype.exists, Subtype.coe_mk] at ht
rcases ht with ⟨u, hu⟩
rw [← hu.2]
exact p.r_le _
-- therefore, one may use them to construct a satellite configuration with `N+1` points
let sc : SatelliteConfig α N p.τ :=
{ c := fun k => p.c (p.index (G k))
r := fun k => p.r (p.index (G k))
rpos := fun k => p.rpos (p.index (G k))
h := by
intro a b a_ne_b
wlog G_le : G a ≤ G b generalizing a b
· exact (this a_ne_b.symm (le_of_not_le G_le)).symm
have G_lt : G a < G b := by
rcases G_le.lt_or_eq with (H | H); · exact H
have A : (a : ℕ) ≠ b := Fin.val_injective.ne a_ne_b
rw [← color_G a (Nat.lt_succ_iff.1 a.2), ← color_G b (Nat.lt_succ_iff.1 b.2), H] at A
exact (A rfl).elim
exact Or.inl (Gab a b G_lt)
hlast := by
intro a ha
have I : (a : ℕ) < N := ha
have : G a < G (Fin.last N) := by dsimp; simp [G, I.ne, (hg a I).1]
exact Gab _ _ this
inter := by
intro a ha
have I : (a : ℕ) < N := ha
have J : G (Fin.last N) = i := by dsimp; simp only [G, if_true, eq_self_iff_true]
have K : G a = g a := by dsimp [G]; simp [I.ne, (hg a I).1]
convert dist_le_add_of_nonempty_closedBall_inter_closedBall (hg _ I).2.1 }
-- this is a contradiction
exact hN.false sc
end TauPackage
open TauPackage
/-- The topological Besicovitch covering theorem: there exist finitely many families of disjoint
balls covering all the centers in a package. More specifically, one can use `N` families if there
are no satellite configurations with `N+1` points. -/
theorem exist_disjoint_covering_families {N : ℕ} {τ : ℝ} (hτ : 1 < τ)
(hN : IsEmpty (SatelliteConfig α N τ)) (q : BallPackage β α) :
∃ s : Fin N → Set β,
(∀ i : Fin N, (s i).PairwiseDisjoint fun j => closedBall (q.c j) (q.r j)) ∧
range q.c ⊆ ⋃ i : Fin N, ⋃ j ∈ s i, ball (q.c j) (q.r j) := by
-- first exclude the trivial case where `β` is empty (we need non-emptiness for the transfinite
-- induction, to be able to choose garbage when there is no point left).
cases isEmpty_or_nonempty β
· refine ⟨fun _ => ∅, fun _ => pairwiseDisjoint_empty, ?_⟩
rw [← image_univ, eq_empty_of_isEmpty (univ : Set β)]
simp
-- Now, assume `β` is nonempty.
let p : TauPackage β α :=
{ q with
τ
one_lt_tau := hτ }
-- we use for `s i` the balls of color `i`.
let s := fun i : Fin N =>
⋃ (k : Ordinal.{u}) (_ : k < p.lastStep) (_ : p.color k = i), ({p.index k} : Set β)
refine ⟨s, fun i => ?_, ?_⟩
· -- show that balls of the same color are disjoint
intro x hx y hy x_ne_y
obtain ⟨jx, jx_lt, jxi, rfl⟩ :
∃ jx : Ordinal, jx < p.lastStep ∧ p.color jx = i ∧ x = p.index jx := by
simpa only [s, exists_prop, mem_iUnion, mem_singleton_iff] using hx
obtain ⟨jy, jy_lt, jyi, rfl⟩ :
∃ jy : Ordinal, jy < p.lastStep ∧ p.color jy = i ∧ y = p.index jy := by
simpa only [s, exists_prop, mem_iUnion, mem_singleton_iff] using hy
wlog jxy : jx ≤ jy generalizing jx jy
· exact (this jy jy_lt jyi hy jx jx_lt jxi hx x_ne_y.symm (le_of_not_le jxy)).symm
replace jxy : jx < jy := by
rcases lt_or_eq_of_le jxy with (H | rfl); · { exact H }; · { exact (x_ne_y rfl).elim }
let A : Set ℕ :=
⋃ (j : { j // j < jy })
(_ : (closedBall (p.c (p.index j)) (p.r (p.index j)) ∩
closedBall (p.c (p.index jy)) (p.r (p.index jy))).Nonempty),
| {p.color j}
have color_j : p.color jy = sInf (univ \ A) := by rw [TauPackage.color]
have h : p.color jy ∈ univ \ A := by
rw [color_j]
apply csInf_mem
refine ⟨N, ?_⟩
simp only [A, not_exists, true_and, exists_prop, mem_iUnion, mem_singleton_iff, not_and,
mem_univ, mem_diff, Subtype.exists, Subtype.coe_mk]
intro k hk _
exact (p.color_lt (hk.trans jy_lt) hN).ne'
simp only [A, not_exists, true_and, exists_prop, mem_iUnion, mem_singleton_iff, not_and,
mem_univ, mem_diff, Subtype.exists, Subtype.coe_mk] at h
specialize h jx jxy
contrapose! h
simpa only [jxi, jyi, and_true, eq_self_iff_true, ← not_disjoint_iff_nonempty_inter] using h
· -- show that the balls of color at most `N` cover every center.
refine range_subset_iff.2 fun b => ?_
obtain ⟨a, ha⟩ :
∃ a : Ordinal, a < p.lastStep ∧ dist (p.c b) (p.c (p.index a)) < p.r (p.index a) := by
simpa only [iUnionUpTo, exists_prop, mem_iUnion, mem_ball, Subtype.exists,
Subtype.coe_mk] using p.mem_iUnionUpTo_lastStep b
simp only [s, exists_prop, mem_iUnion, mem_ball, mem_singleton_iff, biUnion_and',
exists_eq_left, iUnion_exists, exists_and_left]
exact ⟨⟨p.color a, p.color_lt ha.1 hN⟩, a, rfl, ha⟩
/-!
### The measurable Besicovitch covering theorem
-/
open scoped NNReal
variable [SecondCountableTopology α] [MeasurableSpace α] [OpensMeasurableSpace α]
/-- Consider, for each `x` in a set `s`, a radius `r x ∈ (0, 1]`. Then one can find finitely
many disjoint balls of the form `closedBall x (r x)` covering a proportion `1/(N+1)` of `s`, if
there are no satellite configurations with `N+1` points.
-/
theorem exist_finset_disjoint_balls_large_measure (μ : Measure α) [IsFiniteMeasure μ] {N : ℕ}
{τ : ℝ} (hτ : 1 < τ) (hN : IsEmpty (SatelliteConfig α N τ)) (s : Set α) (r : α → ℝ)
(rpos : ∀ x ∈ s, 0 < r x) (rle : ∀ x ∈ s, r x ≤ 1) :
∃ t : Finset α, ↑t ⊆ s ∧ μ (s \ ⋃ x ∈ t, closedBall x (r x)) ≤ N / (N + 1) * μ s ∧
(t : Set α).PairwiseDisjoint fun x => closedBall x (r x) := by
classical
-- exclude the trivial case where `μ s = 0`.
rcases le_or_lt (μ s) 0 with (hμs | hμs)
· have : μ s = 0 := le_bot_iff.1 hμs
refine ⟨∅, by simp only [Finset.coe_empty, empty_subset], ?_, ?_⟩
· simp only [this, Finset.not_mem_empty, diff_empty, iUnion_false, iUnion_empty,
nonpos_iff_eq_zero, mul_zero]
· simp only [Finset.coe_empty, pairwiseDisjoint_empty]
cases isEmpty_or_nonempty α
· simp only [eq_empty_of_isEmpty s, measure_empty] at hμs
exact (lt_irrefl _ hμs).elim
have Npos : N ≠ 0 := by
rintro rfl
inhabit α
exact not_isEmpty_of_nonempty _ hN
-- introduce a measurable superset `o` with the same measure, for measure computations
obtain ⟨o, so, omeas, μo⟩ : ∃ o : Set α, s ⊆ o ∧ MeasurableSet o ∧ μ o = μ s :=
| Mathlib/MeasureTheory/Covering/Besicovitch.lean | 488 | 547 |
/-
Copyright (c) 2018 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes, Abhimanyu Pallavi Sudhir, Jean Lo, Calle Sönne, Benjamin Davidson
-/
import Mathlib.Algebra.Field.NegOnePow
import Mathlib.Algebra.Field.Periodic
import Mathlib.Algebra.QuadraticDiscriminant
import Mathlib.Analysis.SpecialFunctions.Exp
/-!
# Trigonometric functions
## Main definitions
This file contains the definition of `π`.
See also `Analysis.SpecialFunctions.Trigonometric.Inverse` and
`Analysis.SpecialFunctions.Trigonometric.Arctan` for the inverse trigonometric functions.
See also `Analysis.SpecialFunctions.Complex.Arg` and
`Analysis.SpecialFunctions.Complex.Log` for the complex argument function
and the complex logarithm.
## Main statements
Many basic inequalities on the real trigonometric functions are established.
The continuity of the usual trigonometric functions is proved.
Several facts about the real trigonometric functions have the proofs deferred to
`Analysis.SpecialFunctions.Trigonometric.Complex`,
as they are most easily proved by appealing to the corresponding fact for
complex trigonometric functions.
See also `Analysis.SpecialFunctions.Trigonometric.Chebyshev` for the multiple angle formulas
in terms of Chebyshev polynomials.
## Tags
sin, cos, tan, angle
-/
noncomputable section
open Topology Filter Set
namespace Complex
@[continuity, fun_prop]
theorem continuous_sin : Continuous sin := by
change Continuous fun z => (exp (-z * I) - exp (z * I)) * I / 2
fun_prop
@[fun_prop]
theorem continuousOn_sin {s : Set ℂ} : ContinuousOn sin s :=
continuous_sin.continuousOn
@[continuity, fun_prop]
theorem continuous_cos : Continuous cos := by
change Continuous fun z => (exp (z * I) + exp (-z * I)) / 2
fun_prop
@[fun_prop]
theorem continuousOn_cos {s : Set ℂ} : ContinuousOn cos s :=
continuous_cos.continuousOn
@[continuity, fun_prop]
theorem continuous_sinh : Continuous sinh := by
change Continuous fun z => (exp z - exp (-z)) / 2
fun_prop
@[continuity, fun_prop]
theorem continuous_cosh : Continuous cosh := by
change Continuous fun z => (exp z + exp (-z)) / 2
fun_prop
end Complex
namespace Real
variable {x y z : ℝ}
@[continuity, fun_prop]
theorem continuous_sin : Continuous sin :=
Complex.continuous_re.comp (Complex.continuous_sin.comp Complex.continuous_ofReal)
@[fun_prop]
theorem continuousOn_sin {s} : ContinuousOn sin s :=
continuous_sin.continuousOn
@[continuity, fun_prop]
theorem continuous_cos : Continuous cos :=
Complex.continuous_re.comp (Complex.continuous_cos.comp Complex.continuous_ofReal)
@[fun_prop]
theorem continuousOn_cos {s} : ContinuousOn cos s :=
continuous_cos.continuousOn
@[continuity, fun_prop]
theorem continuous_sinh : Continuous sinh :=
Complex.continuous_re.comp (Complex.continuous_sinh.comp Complex.continuous_ofReal)
@[continuity, fun_prop]
theorem continuous_cosh : Continuous cosh :=
Complex.continuous_re.comp (Complex.continuous_cosh.comp Complex.continuous_ofReal)
end Real
namespace Real
theorem exists_cos_eq_zero : 0 ∈ cos '' Icc (1 : ℝ) 2 :=
intermediate_value_Icc' (by norm_num) continuousOn_cos
⟨le_of_lt cos_two_neg, le_of_lt cos_one_pos⟩
/-- The number π = 3.14159265... Defined here using choice as twice a zero of cos in [1,2], from
which one can derive all its properties. For explicit bounds on π, see `Data.Real.Pi.Bounds`.
Denoted `π`, once the `Real` namespace is opened. -/
protected noncomputable def pi : ℝ :=
2 * Classical.choose exists_cos_eq_zero
@[inherit_doc]
scoped notation "π" => Real.pi
@[simp]
theorem cos_pi_div_two : cos (π / 2) = 0 := by
rw [Real.pi, mul_div_cancel_left₀ _ (two_ne_zero' ℝ)]
exact (Classical.choose_spec exists_cos_eq_zero).2
theorem one_le_pi_div_two : (1 : ℝ) ≤ π / 2 := by
rw [Real.pi, mul_div_cancel_left₀ _ (two_ne_zero' ℝ)]
exact (Classical.choose_spec exists_cos_eq_zero).1.1
theorem pi_div_two_le_two : π / 2 ≤ 2 := by
rw [Real.pi, mul_div_cancel_left₀ _ (two_ne_zero' ℝ)]
exact (Classical.choose_spec exists_cos_eq_zero).1.2
theorem two_le_pi : (2 : ℝ) ≤ π :=
(div_le_div_iff_of_pos_right (show (0 : ℝ) < 2 by norm_num)).1
(by rw [div_self (two_ne_zero' ℝ)]; exact one_le_pi_div_two)
theorem pi_le_four : π ≤ 4 :=
(div_le_div_iff_of_pos_right (show (0 : ℝ) < 2 by norm_num)).1
(calc
π / 2 ≤ 2 := pi_div_two_le_two
_ = 4 / 2 := by norm_num)
@[bound]
theorem pi_pos : 0 < π :=
lt_of_lt_of_le (by norm_num) two_le_pi
@[bound]
theorem pi_nonneg : 0 ≤ π :=
pi_pos.le
theorem pi_ne_zero : π ≠ 0 :=
pi_pos.ne'
theorem pi_div_two_pos : 0 < π / 2 :=
half_pos pi_pos
theorem two_pi_pos : 0 < 2 * π := by linarith [pi_pos]
end Real
namespace Mathlib.Meta.Positivity
open Lean.Meta Qq
/-- Extension for the `positivity` tactic: `π` is always positive. -/
@[positivity Real.pi]
def evalRealPi : PositivityExt where eval {u α} _zα _pα e := do
match u, α, e with
| 0, ~q(ℝ), ~q(Real.pi) =>
assertInstancesCommute
pure (.positive q(Real.pi_pos))
| _, _, _ => throwError "not Real.pi"
end Mathlib.Meta.Positivity
namespace NNReal
open Real
open Real NNReal
/-- `π` considered as a nonnegative real. -/
noncomputable def pi : ℝ≥0 :=
⟨π, Real.pi_pos.le⟩
@[simp]
theorem coe_real_pi : (pi : ℝ) = π :=
rfl
theorem pi_pos : 0 < pi := mod_cast Real.pi_pos
theorem pi_ne_zero : pi ≠ 0 :=
pi_pos.ne'
end NNReal
namespace Real
@[simp]
theorem sin_pi : sin π = 0 := by
rw [← mul_div_cancel_left₀ π (two_ne_zero' ℝ), two_mul, add_div, sin_add, cos_pi_div_two]; simp
@[simp]
theorem cos_pi : cos π = -1 := by
rw [← mul_div_cancel_left₀ π (two_ne_zero' ℝ), mul_div_assoc, cos_two_mul, cos_pi_div_two]
norm_num
@[simp]
theorem sin_two_pi : sin (2 * π) = 0 := by simp [two_mul, sin_add]
@[simp]
theorem cos_two_pi : cos (2 * π) = 1 := by simp [two_mul, cos_add]
theorem sin_antiperiodic : Function.Antiperiodic sin π := by simp [sin_add]
theorem sin_periodic : Function.Periodic sin (2 * π) :=
sin_antiperiodic.periodic_two_mul
@[simp]
theorem sin_add_pi (x : ℝ) : sin (x + π) = -sin x :=
sin_antiperiodic x
@[simp]
theorem sin_add_two_pi (x : ℝ) : sin (x + 2 * π) = sin x :=
sin_periodic x
@[simp]
theorem sin_sub_pi (x : ℝ) : sin (x - π) = -sin x :=
sin_antiperiodic.sub_eq x
@[simp]
theorem sin_sub_two_pi (x : ℝ) : sin (x - 2 * π) = sin x :=
sin_periodic.sub_eq x
@[simp]
theorem sin_pi_sub (x : ℝ) : sin (π - x) = sin x :=
neg_neg (sin x) ▸ sin_neg x ▸ sin_antiperiodic.sub_eq'
@[simp]
theorem sin_two_pi_sub (x : ℝ) : sin (2 * π - x) = -sin x :=
sin_neg x ▸ sin_periodic.sub_eq'
@[simp]
theorem sin_nat_mul_pi (n : ℕ) : sin (n * π) = 0 :=
sin_antiperiodic.nat_mul_eq_of_eq_zero sin_zero n
@[simp]
theorem sin_int_mul_pi (n : ℤ) : sin (n * π) = 0 :=
sin_antiperiodic.int_mul_eq_of_eq_zero sin_zero n
@[simp]
theorem sin_add_nat_mul_two_pi (x : ℝ) (n : ℕ) : sin (x + n * (2 * π)) = sin x :=
sin_periodic.nat_mul n x
@[simp]
theorem sin_add_int_mul_two_pi (x : ℝ) (n : ℤ) : sin (x + n * (2 * π)) = sin x :=
sin_periodic.int_mul n x
@[simp]
theorem sin_sub_nat_mul_two_pi (x : ℝ) (n : ℕ) : sin (x - n * (2 * π)) = sin x :=
sin_periodic.sub_nat_mul_eq n
@[simp]
theorem sin_sub_int_mul_two_pi (x : ℝ) (n : ℤ) : sin (x - n * (2 * π)) = sin x :=
sin_periodic.sub_int_mul_eq n
@[simp]
theorem sin_nat_mul_two_pi_sub (x : ℝ) (n : ℕ) : sin (n * (2 * π) - x) = -sin x :=
sin_neg x ▸ sin_periodic.nat_mul_sub_eq n
@[simp]
theorem sin_int_mul_two_pi_sub (x : ℝ) (n : ℤ) : sin (n * (2 * π) - x) = -sin x :=
sin_neg x ▸ sin_periodic.int_mul_sub_eq n
theorem sin_add_int_mul_pi (x : ℝ) (n : ℤ) : sin (x + n * π) = (-1) ^ n * sin x :=
n.cast_negOnePow ℝ ▸ sin_antiperiodic.add_int_mul_eq n
theorem sin_add_nat_mul_pi (x : ℝ) (n : ℕ) : sin (x + n * π) = (-1) ^ n * sin x :=
sin_antiperiodic.add_nat_mul_eq n
theorem sin_sub_int_mul_pi (x : ℝ) (n : ℤ) : sin (x - n * π) = (-1) ^ n * sin x :=
n.cast_negOnePow ℝ ▸ sin_antiperiodic.sub_int_mul_eq n
theorem sin_sub_nat_mul_pi (x : ℝ) (n : ℕ) : sin (x - n * π) = (-1) ^ n * sin x :=
sin_antiperiodic.sub_nat_mul_eq n
theorem sin_int_mul_pi_sub (x : ℝ) (n : ℤ) : sin (n * π - x) = -((-1) ^ n * sin x) := by
simpa only [sin_neg, mul_neg, Int.cast_negOnePow] using sin_antiperiodic.int_mul_sub_eq n
theorem sin_nat_mul_pi_sub (x : ℝ) (n : ℕ) : sin (n * π - x) = -((-1) ^ n * sin x) := by
simpa only [sin_neg, mul_neg] using sin_antiperiodic.nat_mul_sub_eq n
theorem cos_antiperiodic : Function.Antiperiodic cos π := by simp [cos_add]
theorem cos_periodic : Function.Periodic cos (2 * π) :=
cos_antiperiodic.periodic_two_mul
@[simp]
theorem abs_cos_int_mul_pi (k : ℤ) : |cos (k * π)| = 1 := by
simp [abs_cos_eq_sqrt_one_sub_sin_sq]
@[simp]
theorem cos_add_pi (x : ℝ) : cos (x + π) = -cos x :=
cos_antiperiodic x
@[simp]
theorem cos_add_two_pi (x : ℝ) : cos (x + 2 * π) = cos x :=
cos_periodic x
@[simp]
theorem cos_sub_pi (x : ℝ) : cos (x - π) = -cos x :=
cos_antiperiodic.sub_eq x
@[simp]
theorem cos_sub_two_pi (x : ℝ) : cos (x - 2 * π) = cos x :=
cos_periodic.sub_eq x
@[simp]
theorem cos_pi_sub (x : ℝ) : cos (π - x) = -cos x :=
cos_neg x ▸ cos_antiperiodic.sub_eq'
@[simp]
theorem cos_two_pi_sub (x : ℝ) : cos (2 * π - x) = cos x :=
cos_neg x ▸ cos_periodic.sub_eq'
@[simp]
theorem cos_nat_mul_two_pi (n : ℕ) : cos (n * (2 * π)) = 1 :=
(cos_periodic.nat_mul_eq n).trans cos_zero
@[simp]
theorem cos_int_mul_two_pi (n : ℤ) : cos (n * (2 * π)) = 1 :=
(cos_periodic.int_mul_eq n).trans cos_zero
@[simp]
theorem cos_add_nat_mul_two_pi (x : ℝ) (n : ℕ) : cos (x + n * (2 * π)) = cos x :=
cos_periodic.nat_mul n x
@[simp]
theorem cos_add_int_mul_two_pi (x : ℝ) (n : ℤ) : cos (x + n * (2 * π)) = cos x :=
cos_periodic.int_mul n x
@[simp]
theorem cos_sub_nat_mul_two_pi (x : ℝ) (n : ℕ) : cos (x - n * (2 * π)) = cos x :=
cos_periodic.sub_nat_mul_eq n
@[simp]
theorem cos_sub_int_mul_two_pi (x : ℝ) (n : ℤ) : cos (x - n * (2 * π)) = cos x :=
cos_periodic.sub_int_mul_eq n
@[simp]
theorem cos_nat_mul_two_pi_sub (x : ℝ) (n : ℕ) : cos (n * (2 * π) - x) = cos x :=
cos_neg x ▸ cos_periodic.nat_mul_sub_eq n
@[simp]
theorem cos_int_mul_two_pi_sub (x : ℝ) (n : ℤ) : cos (n * (2 * π) - x) = cos x :=
cos_neg x ▸ cos_periodic.int_mul_sub_eq n
theorem cos_add_int_mul_pi (x : ℝ) (n : ℤ) : cos (x + n * π) = (-1) ^ n * cos x :=
n.cast_negOnePow ℝ ▸ cos_antiperiodic.add_int_mul_eq n
theorem cos_add_nat_mul_pi (x : ℝ) (n : ℕ) : cos (x + n * π) = (-1) ^ n * cos x :=
cos_antiperiodic.add_nat_mul_eq n
theorem cos_sub_int_mul_pi (x : ℝ) (n : ℤ) : cos (x - n * π) = (-1) ^ n * cos x :=
n.cast_negOnePow ℝ ▸ cos_antiperiodic.sub_int_mul_eq n
theorem cos_sub_nat_mul_pi (x : ℝ) (n : ℕ) : cos (x - n * π) = (-1) ^ n * cos x :=
cos_antiperiodic.sub_nat_mul_eq n
theorem cos_int_mul_pi_sub (x : ℝ) (n : ℤ) : cos (n * π - x) = (-1) ^ n * cos x :=
n.cast_negOnePow ℝ ▸ cos_neg x ▸ cos_antiperiodic.int_mul_sub_eq n
theorem cos_nat_mul_pi_sub (x : ℝ) (n : ℕ) : cos (n * π - x) = (-1) ^ n * cos x :=
cos_neg x ▸ cos_antiperiodic.nat_mul_sub_eq n
theorem cos_nat_mul_two_pi_add_pi (n : ℕ) : cos (n * (2 * π) + π) = -1 := by
simpa only [cos_zero] using (cos_periodic.nat_mul n).add_antiperiod_eq cos_antiperiodic
theorem cos_int_mul_two_pi_add_pi (n : ℤ) : cos (n * (2 * π) + π) = -1 := by
simpa only [cos_zero] using (cos_periodic.int_mul n).add_antiperiod_eq cos_antiperiodic
theorem cos_nat_mul_two_pi_sub_pi (n : ℕ) : cos (n * (2 * π) - π) = -1 := by
simpa only [cos_zero] using (cos_periodic.nat_mul n).sub_antiperiod_eq cos_antiperiodic
theorem cos_int_mul_two_pi_sub_pi (n : ℤ) : cos (n * (2 * π) - π) = -1 := by
simpa only [cos_zero] using (cos_periodic.int_mul n).sub_antiperiod_eq cos_antiperiodic
theorem sin_pos_of_pos_of_lt_pi {x : ℝ} (h0x : 0 < x) (hxp : x < π) : 0 < sin x :=
if hx2 : x ≤ 2 then sin_pos_of_pos_of_le_two h0x hx2
else
have : (2 : ℝ) + 2 = 4 := by norm_num
have : π - x ≤ 2 :=
sub_le_iff_le_add.2 (le_trans pi_le_four (this ▸ add_le_add_left (le_of_not_ge hx2) _))
sin_pi_sub x ▸ sin_pos_of_pos_of_le_two (sub_pos.2 hxp) this
theorem sin_pos_of_mem_Ioo {x : ℝ} (hx : x ∈ Ioo 0 π) : 0 < sin x :=
sin_pos_of_pos_of_lt_pi hx.1 hx.2
theorem sin_nonneg_of_mem_Icc {x : ℝ} (hx : x ∈ Icc 0 π) : 0 ≤ sin x := by
rw [← closure_Ioo pi_ne_zero.symm] at hx
exact
closure_lt_subset_le continuous_const continuous_sin
(closure_mono (fun y => sin_pos_of_mem_Ioo) hx)
theorem sin_nonneg_of_nonneg_of_le_pi {x : ℝ} (h0x : 0 ≤ x) (hxp : x ≤ π) : 0 ≤ sin x :=
sin_nonneg_of_mem_Icc ⟨h0x, hxp⟩
theorem sin_neg_of_neg_of_neg_pi_lt {x : ℝ} (hx0 : x < 0) (hpx : -π < x) : sin x < 0 :=
neg_pos.1 <| sin_neg x ▸ sin_pos_of_pos_of_lt_pi (neg_pos.2 hx0) (neg_lt.1 hpx)
theorem sin_nonpos_of_nonnpos_of_neg_pi_le {x : ℝ} (hx0 : x ≤ 0) (hpx : -π ≤ x) : sin x ≤ 0 :=
neg_nonneg.1 <| sin_neg x ▸ sin_nonneg_of_nonneg_of_le_pi (neg_nonneg.2 hx0) (neg_le.1 hpx)
@[simp]
theorem sin_pi_div_two : sin (π / 2) = 1 :=
have : sin (π / 2) = 1 ∨ sin (π / 2) = -1 := by
simpa [sq, mul_self_eq_one_iff] using sin_sq_add_cos_sq (π / 2)
this.resolve_right fun h =>
show ¬(0 : ℝ) < -1 by norm_num <|
h ▸ sin_pos_of_pos_of_lt_pi pi_div_two_pos (half_lt_self pi_pos)
theorem sin_add_pi_div_two (x : ℝ) : sin (x + π / 2) = cos x := by simp [sin_add]
theorem sin_sub_pi_div_two (x : ℝ) : sin (x - π / 2) = -cos x := by simp [sub_eq_add_neg, sin_add]
theorem sin_pi_div_two_sub (x : ℝ) : sin (π / 2 - x) = cos x := by simp [sub_eq_add_neg, sin_add]
theorem cos_add_pi_div_two (x : ℝ) : cos (x + π / 2) = -sin x := by simp [cos_add]
theorem cos_sub_pi_div_two (x : ℝ) : cos (x - π / 2) = sin x := by simp [sub_eq_add_neg, cos_add]
theorem cos_pi_div_two_sub (x : ℝ) : cos (π / 2 - x) = sin x := by
rw [← cos_neg, neg_sub, cos_sub_pi_div_two]
theorem cos_pos_of_mem_Ioo {x : ℝ} (hx : x ∈ Ioo (-(π / 2)) (π / 2)) : 0 < cos x :=
sin_add_pi_div_two x ▸ sin_pos_of_mem_Ioo ⟨by linarith [hx.1], by linarith [hx.2]⟩
theorem cos_nonneg_of_mem_Icc {x : ℝ} (hx : x ∈ Icc (-(π / 2)) (π / 2)) : 0 ≤ cos x :=
sin_add_pi_div_two x ▸ sin_nonneg_of_mem_Icc ⟨by linarith [hx.1], by linarith [hx.2]⟩
theorem cos_nonneg_of_neg_pi_div_two_le_of_le {x : ℝ} (hl : -(π / 2) ≤ x) (hu : x ≤ π / 2) :
0 ≤ cos x :=
cos_nonneg_of_mem_Icc ⟨hl, hu⟩
theorem cos_neg_of_pi_div_two_lt_of_lt {x : ℝ} (hx₁ : π / 2 < x) (hx₂ : x < π + π / 2) :
cos x < 0 :=
neg_pos.1 <| cos_pi_sub x ▸ cos_pos_of_mem_Ioo ⟨by linarith, by linarith⟩
theorem cos_nonpos_of_pi_div_two_le_of_le {x : ℝ} (hx₁ : π / 2 ≤ x) (hx₂ : x ≤ π + π / 2) :
cos x ≤ 0 :=
neg_nonneg.1 <| cos_pi_sub x ▸ cos_nonneg_of_mem_Icc ⟨by linarith, by linarith⟩
theorem sin_eq_sqrt_one_sub_cos_sq {x : ℝ} (hl : 0 ≤ x) (hu : x ≤ π) :
sin x = √(1 - cos x ^ 2) := by
rw [← abs_sin_eq_sqrt_one_sub_cos_sq, abs_of_nonneg (sin_nonneg_of_nonneg_of_le_pi hl hu)]
theorem cos_eq_sqrt_one_sub_sin_sq {x : ℝ} (hl : -(π / 2) ≤ x) (hu : x ≤ π / 2) :
cos x = √(1 - sin x ^ 2) := by
rw [← abs_cos_eq_sqrt_one_sub_sin_sq, abs_of_nonneg (cos_nonneg_of_mem_Icc ⟨hl, hu⟩)]
lemma cos_half {x : ℝ} (hl : -π ≤ x) (hr : x ≤ π) : cos (x / 2) = sqrt ((1 + cos x) / 2) := by
have : 0 ≤ cos (x / 2) := cos_nonneg_of_mem_Icc <| by constructor <;> linarith
rw [← sqrt_sq this, cos_sq, add_div, two_mul, add_halves]
lemma abs_sin_half (x : ℝ) : |sin (x / 2)| = sqrt ((1 - cos x) / 2) := by
rw [← sqrt_sq_eq_abs, sin_sq_eq_half_sub, two_mul, add_halves, sub_div]
lemma sin_half_eq_sqrt {x : ℝ} (hl : 0 ≤ x) (hr : x ≤ 2 * π) :
sin (x / 2) = sqrt ((1 - cos x) / 2) := by
rw [← abs_sin_half, abs_of_nonneg]
apply sin_nonneg_of_nonneg_of_le_pi <;> linarith
lemma sin_half_eq_neg_sqrt {x : ℝ} (hl : -(2 * π) ≤ x) (hr : x ≤ 0) :
sin (x / 2) = -sqrt ((1 - cos x) / 2) := by
rw [← abs_sin_half, abs_of_nonpos, neg_neg]
apply sin_nonpos_of_nonnpos_of_neg_pi_le <;> linarith
theorem sin_eq_zero_iff_of_lt_of_lt {x : ℝ} (hx₁ : -π < x) (hx₂ : x < π) : sin x = 0 ↔ x = 0 :=
⟨fun h => by
contrapose! h
cases h.lt_or_lt with
| inl h0 => exact (sin_neg_of_neg_of_neg_pi_lt h0 hx₁).ne
| inr h0 => exact (sin_pos_of_pos_of_lt_pi h0 hx₂).ne',
fun h => by simp [h]⟩
theorem sin_eq_zero_iff {x : ℝ} : sin x = 0 ↔ ∃ n : ℤ, (n : ℝ) * π = x :=
⟨fun h =>
⟨⌊x / π⌋,
le_antisymm (sub_nonneg.1 (Int.sub_floor_div_mul_nonneg _ pi_pos))
(sub_nonpos.1 <|
le_of_not_gt fun h₃ =>
(sin_pos_of_pos_of_lt_pi h₃ (Int.sub_floor_div_mul_lt _ pi_pos)).ne
(by simp [sub_eq_add_neg, sin_add, h, sin_int_mul_pi]))⟩,
fun ⟨_, hn⟩ => hn ▸ sin_int_mul_pi _⟩
theorem sin_ne_zero_iff {x : ℝ} : sin x ≠ 0 ↔ ∀ n : ℤ, (n : ℝ) * π ≠ x := by
rw [← not_exists, not_iff_not, sin_eq_zero_iff]
theorem sin_eq_zero_iff_cos_eq {x : ℝ} : sin x = 0 ↔ cos x = 1 ∨ cos x = -1 := by
rw [← mul_self_eq_one_iff, ← sin_sq_add_cos_sq x, sq, sq, ← sub_eq_iff_eq_add, sub_self]
exact ⟨fun h => by rw [h, mul_zero], eq_zero_of_mul_self_eq_zero ∘ Eq.symm⟩
theorem cos_eq_one_iff (x : ℝ) : cos x = 1 ↔ ∃ n : ℤ, (n : ℝ) * (2 * π) = x :=
⟨fun h =>
let ⟨n, hn⟩ := sin_eq_zero_iff.1 (sin_eq_zero_iff_cos_eq.2 (Or.inl h))
⟨n / 2,
(Int.emod_two_eq_zero_or_one n).elim
(fun hn0 => by
rwa [← mul_assoc, ← @Int.cast_two ℝ, ← Int.cast_mul,
Int.ediv_mul_cancel (Int.dvd_iff_emod_eq_zero.2 hn0)])
fun hn1 => by
rw [← Int.emod_add_ediv n 2, hn1, Int.cast_add, Int.cast_one, add_mul, one_mul, add_comm,
mul_comm (2 : ℤ), Int.cast_mul, mul_assoc, Int.cast_two] at hn
rw [← hn, cos_int_mul_two_pi_add_pi] at h
exact absurd h (by norm_num)⟩,
fun ⟨_, hn⟩ => hn ▸ cos_int_mul_two_pi _⟩
theorem cos_eq_one_iff_of_lt_of_lt {x : ℝ} (hx₁ : -(2 * π) < x) (hx₂ : x < 2 * π) :
cos x = 1 ↔ x = 0 :=
⟨fun h => by
rcases (cos_eq_one_iff _).1 h with ⟨n, rfl⟩
rw [mul_lt_iff_lt_one_left two_pi_pos] at hx₂
rw [neg_lt, neg_mul_eq_neg_mul, mul_lt_iff_lt_one_left two_pi_pos] at hx₁
norm_cast at hx₁ hx₂
obtain rfl : n = 0 := le_antisymm (by omega) (by omega)
simp, fun h => by simp [h]⟩
theorem sin_lt_sin_of_lt_of_le_pi_div_two {x y : ℝ} (hx₁ : -(π / 2) ≤ x) (hy₂ : y ≤ π / 2)
(hxy : x < y) : sin x < sin y := by
rw [← sub_pos, sin_sub_sin]
have : 0 < sin ((y - x) / 2) := by apply sin_pos_of_pos_of_lt_pi <;> linarith
have : 0 < cos ((y + x) / 2) := by refine cos_pos_of_mem_Ioo ⟨?_, ?_⟩ <;> linarith
positivity
theorem strictMonoOn_sin : StrictMonoOn sin (Icc (-(π / 2)) (π / 2)) := fun _ hx _ hy hxy =>
sin_lt_sin_of_lt_of_le_pi_div_two hx.1 hy.2 hxy
theorem cos_lt_cos_of_nonneg_of_le_pi {x y : ℝ} (hx₁ : 0 ≤ x) (hy₂ : y ≤ π) (hxy : x < y) :
cos y < cos x := by
rw [← sin_pi_div_two_sub, ← sin_pi_div_two_sub]
apply sin_lt_sin_of_lt_of_le_pi_div_two <;> linarith
theorem cos_lt_cos_of_nonneg_of_le_pi_div_two {x y : ℝ} (hx₁ : 0 ≤ x) (hy₂ : y ≤ π / 2)
(hxy : x < y) : cos y < cos x :=
cos_lt_cos_of_nonneg_of_le_pi hx₁ (hy₂.trans (by linarith)) hxy
theorem strictAntiOn_cos : StrictAntiOn cos (Icc 0 π) := fun _ hx _ hy hxy =>
cos_lt_cos_of_nonneg_of_le_pi hx.1 hy.2 hxy
theorem cos_le_cos_of_nonneg_of_le_pi {x y : ℝ} (hx₁ : 0 ≤ x) (hy₂ : y ≤ π) (hxy : x ≤ y) :
cos y ≤ cos x :=
(strictAntiOn_cos.le_iff_le ⟨hx₁.trans hxy, hy₂⟩ ⟨hx₁, hxy.trans hy₂⟩).2 hxy
theorem sin_le_sin_of_le_of_le_pi_div_two {x y : ℝ} (hx₁ : -(π / 2) ≤ x) (hy₂ : y ≤ π / 2)
(hxy : x ≤ y) : sin x ≤ sin y :=
(strictMonoOn_sin.le_iff_le ⟨hx₁, hxy.trans hy₂⟩ ⟨hx₁.trans hxy, hy₂⟩).2 hxy
theorem injOn_sin : InjOn sin (Icc (-(π / 2)) (π / 2)) :=
strictMonoOn_sin.injOn
theorem injOn_cos : InjOn cos (Icc 0 π) :=
strictAntiOn_cos.injOn
theorem surjOn_sin : SurjOn sin (Icc (-(π / 2)) (π / 2)) (Icc (-1) 1) := by
simpa only [sin_neg, sin_pi_div_two] using
intermediate_value_Icc (neg_le_self pi_div_two_pos.le) continuous_sin.continuousOn
theorem surjOn_cos : SurjOn cos (Icc 0 π) (Icc (-1) 1) := by
simpa only [cos_zero, cos_pi] using intermediate_value_Icc' pi_pos.le continuous_cos.continuousOn
theorem sin_mem_Icc (x : ℝ) : sin x ∈ Icc (-1 : ℝ) 1 :=
⟨neg_one_le_sin x, sin_le_one x⟩
| theorem cos_mem_Icc (x : ℝ) : cos x ∈ Icc (-1 : ℝ) 1 :=
⟨neg_one_le_cos x, cos_le_one x⟩
theorem mapsTo_sin (s : Set ℝ) : MapsTo sin s (Icc (-1 : ℝ) 1) := fun x _ => sin_mem_Icc x
theorem mapsTo_cos (s : Set ℝ) : MapsTo cos s (Icc (-1 : ℝ) 1) := fun x _ => cos_mem_Icc x
theorem bijOn_sin : BijOn sin (Icc (-(π / 2)) (π / 2)) (Icc (-1) 1) :=
⟨mapsTo_sin _, injOn_sin, surjOn_sin⟩
| Mathlib/Analysis/SpecialFunctions/Trigonometric/Basic.lean | 580 | 588 |
/-
Copyright (c) 2017 Johannes Hölzl. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Mario Carneiro, Floris van Doorn, Violeta Hernández Palacios
-/
import Mathlib.Algebra.GroupWithZero.Divisibility
import Mathlib.Data.Nat.SuccPred
import Mathlib.Order.SuccPred.InitialSeg
import Mathlib.SetTheory.Ordinal.Basic
/-!
# Ordinal arithmetic
Ordinals have an addition (corresponding to disjoint union) that turns them into an additive
monoid, and a multiplication (corresponding to the lexicographic order on the product) that turns
them into a monoid. One can also define correspondingly a subtraction, a division, a successor
function, a power function and a logarithm function.
We also define limit ordinals and prove the basic induction principle on ordinals separating
successor ordinals and limit ordinals, in `limitRecOn`.
## Main definitions and results
* `o₁ + o₂` is the order on the disjoint union of `o₁` and `o₂` obtained by declaring that
every element of `o₁` is smaller than every element of `o₂`.
* `o₁ - o₂` is the unique ordinal `o` such that `o₂ + o = o₁`, when `o₂ ≤ o₁`.
* `o₁ * o₂` is the lexicographic order on `o₂ × o₁`.
* `o₁ / o₂` is the ordinal `o` such that `o₁ = o₂ * o + o'` with `o' < o₂`. We also define the
divisibility predicate, and a modulo operation.
* `Order.succ o = o + 1` is the successor of `o`.
* `pred o` if the predecessor of `o`. If `o` is not a successor, we set `pred o = o`.
We discuss the properties of casts of natural numbers of and of `ω` with respect to these
operations.
Some properties of the operations are also used to discuss general tools on ordinals:
* `IsLimit o`: an ordinal is a limit ordinal if it is neither `0` nor a successor.
* `limitRecOn` is the main induction principle of ordinals: if one can prove a property by
induction at successor ordinals and at limit ordinals, then it holds for all ordinals.
* `IsNormal`: a function `f : Ordinal → Ordinal` satisfies `IsNormal` if it is strictly increasing
and order-continuous, i.e., the image `f o` of a limit ordinal `o` is the sup of `f a` for
`a < o`.
Various other basic arithmetic results are given in `Principal.lean` instead.
-/
assert_not_exists Field Module
noncomputable section
open Function Cardinal Set Equiv Order
open scoped Ordinal
universe u v w
namespace Ordinal
variable {α β γ : Type*} {r : α → α → Prop} {s : β → β → Prop} {t : γ → γ → Prop}
/-! ### Further properties of addition on ordinals -/
@[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⟩
@[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
instance instAddLeftReflectLE :
AddLeftReflectLE Ordinal.{u} where
elim c a b := by
refine inductionOn₃ a b c fun α r _ β s _ γ t _ ⟨f⟩ ↦ ?_
have H₁ a : f (Sum.inl a) = Sum.inl a := by
simpa using ((InitialSeg.leAdd t r).trans f).eq (InitialSeg.leAdd t s) a
have H₂ a : ∃ b, f (Sum.inr a) = Sum.inr b := by
generalize hx : f (Sum.inr a) = x
obtain x | x := x
· rw [← H₁, f.inj] at hx
contradiction
· exact ⟨x, rfl⟩
choose g hg using H₂
refine (RelEmbedding.ofMonotone g fun _ _ h ↦ ?_).ordinal_type_le
rwa [← @Sum.lex_inr_inr _ t _ s, ← hg, ← hg, f.map_rel_iff, Sum.lex_inr_inr]
instance : IsLeftCancelAdd Ordinal where
add_left_cancel a b c h := by simpa only [le_antisymm_iff, add_le_add_iff_left] using h
@[deprecated add_left_cancel_iff (since := "2024-12-11")]
protected theorem add_left_cancel (a) {b c : Ordinal} : a + b = a + c ↔ b = c :=
add_left_cancel_iff
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 instAddLeftStrictMono : AddLeftStrictMono Ordinal.{u} :=
⟨fun a _b _c ↦ (add_lt_add_iff_left' a).2⟩
instance instAddLeftReflectLT : AddLeftReflectLT Ordinal.{u} :=
⟨fun a _b _c ↦ (add_lt_add_iff_left' a).1⟩
instance instAddRightReflectLT : AddRightReflectLT Ordinal.{u} :=
⟨fun _a _b _c ↦ lt_imp_lt_of_le_imp_le fun h => add_le_add_right h _⟩
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]
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]
theorem add_eq_zero_iff {a b : Ordinal} : a + b = 0 ↔ a = 0 ∧ b = 0 :=
inductionOn₂ a b fun α r _ β s _ => by
simp_rw [← type_sum_lex, type_eq_zero_iff_isEmpty]
exact isEmpty_sum
theorem left_eq_zero_of_add_eq_zero {a b : Ordinal} (h : a + b = 0) : a = 0 :=
(add_eq_zero_iff.1 h).1
theorem right_eq_zero_of_add_eq_zero {a b : Ordinal} (h : a + b = 0) : b = 0 :=
(add_eq_zero_iff.1 h).2
/-! ### The predecessor of an ordinal -/
open Classical in
/-- The ordinal predecessor of `o` is `o'` if `o = succ o'`,
and `o` otherwise. -/
def pred (o : Ordinal) : Ordinal :=
if h : ∃ a, o = succ a then Classical.choose h else o
@[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
theorem pred_le_self (o) : pred o ≤ o := by
classical
exact 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]
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⟩
theorem pred_eq_iff_not_succ' {o} : pred o = o ↔ ∀ a, o ≠ succ a := by
simpa using 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, not_le])
(iff_not_comm.1 pred_eq_iff_not_succ).symm
@[simp]
theorem pred_zero : pred 0 = 0 :=
pred_eq_iff_not_succ'.2 fun a => (succ_ne_zero a).symm
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]⟩
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⟩⟩
theorem lt_pred {a b} : a < pred b ↔ succ a < b := by
classical
exact 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]
theorem pred_le {a b} : pred a ≤ b ↔ a ≤ succ b :=
le_iff_le_iff_lt_iff_lt.2 lt_pred
@[simp]
theorem lift_is_succ {o : Ordinal.{v}} : (∃ a, lift.{u} o = succ a) ↔ ∃ a, o = succ a :=
⟨fun ⟨a, h⟩ =>
let ⟨b, e⟩ := mem_range_lift_of_le <| show a ≤ lift.{u} o from le_of_lt <| h.symm ▸ lt_succ a
⟨b, (lift_inj.{u,v}).1 <| by rw [h, ← e, lift_succ]⟩,
fun ⟨a, h⟩ => ⟨lift.{u} a, by simp only [h, lift_succ]⟩⟩
@[simp]
theorem lift_pred (o : Ordinal.{v}) : lift.{u} (pred o) = pred (lift.{u} o) := by
classical
exact if h : ∃ a, o = succ a then by obtain ⟨a, e⟩ := h; 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)]
/-! ### Limit ordinals -/
/-- A limit ordinal is an ordinal which is not zero and not a successor.
TODO: deprecate this in favor of `Order.IsSuccLimit`. -/
def IsLimit (o : Ordinal) : Prop :=
IsSuccLimit o
theorem isLimit_iff {o} : IsLimit o ↔ o ≠ 0 ∧ IsSuccPrelimit o := by
simp [IsLimit, IsSuccLimit]
theorem IsLimit.isSuccPrelimit {o} (h : IsLimit o) : IsSuccPrelimit o :=
IsSuccLimit.isSuccPrelimit h
theorem IsLimit.succ_lt {o a : Ordinal} (h : IsLimit o) : a < o → succ a < o :=
IsSuccLimit.succ_lt h
theorem isSuccPrelimit_zero : IsSuccPrelimit (0 : Ordinal) := isSuccPrelimit_bot
theorem not_zero_isLimit : ¬IsLimit 0 :=
not_isSuccLimit_bot
theorem not_succ_isLimit (o) : ¬IsLimit (succ o) :=
not_isSuccLimit_succ o
theorem not_succ_of_isLimit {o} (h : IsLimit o) : ¬∃ a, o = succ a
| ⟨a, e⟩ => not_succ_isLimit a (e ▸ h)
theorem succ_lt_of_isLimit {o a : Ordinal} (h : IsLimit o) : succ a < o ↔ a < o :=
IsSuccLimit.succ_lt_iff h
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
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)⟩
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)
@[simp]
theorem lift_isLimit (o : Ordinal.{v}) : IsLimit (lift.{u,v} o) ↔ IsLimit o :=
liftInitialSeg.isSuccLimit_apply_iff
theorem IsLimit.pos {o : Ordinal} (h : IsLimit o) : 0 < o :=
IsSuccLimit.bot_lt h
theorem IsLimit.ne_zero {o : Ordinal} (h : IsLimit o) : o ≠ 0 :=
h.pos.ne'
theorem IsLimit.one_lt {o : Ordinal} (h : IsLimit o) : 1 < o := by
simpa only [succ_zero] using h.succ_lt h.pos
theorem IsLimit.nat_lt {o : Ordinal} (h : IsLimit o) : ∀ n : ℕ, (n : Ordinal) < o
| 0 => h.pos
| n + 1 => h.succ_lt (IsLimit.nat_lt h n)
theorem zero_or_succ_or_limit (o : Ordinal) : o = 0 ∨ (∃ a, o = succ a) ∨ IsLimit o := by
simpa [eq_comm] using isMin_or_mem_range_succ_or_isSuccLimit o
theorem isLimit_of_not_succ_of_ne_zero {o : Ordinal} (h : ¬∃ a, o = succ a) (h' : o ≠ 0) :
IsLimit o := ((zero_or_succ_or_limit o).resolve_left h').resolve_left h
-- TODO: this is an iff with `IsSuccPrelimit`
theorem IsLimit.sSup_Iio {o : Ordinal} (h : IsLimit o) : sSup (Iio o) = o := by
apply (csSup_le' (fun a ha ↦ le_of_lt ha)).antisymm
apply le_of_forall_lt
intro a ha
exact (lt_succ a).trans_le (le_csSup bddAbove_Iio (h.succ_lt ha))
theorem IsLimit.iSup_Iio {o : Ordinal} (h : IsLimit o) : ⨆ a : Iio o, a.1 = o := by
rw [← sSup_eq_iSup', h.sSup_Iio]
/-- Main induction principle of ordinals: if one can prove a property by
induction at successor ordinals and at limit ordinals, then it holds for all ordinals. -/
@[elab_as_elim]
def limitRecOn {motive : Ordinal → Sort*} (o : Ordinal)
(zero : motive 0) (succ : ∀ o, motive o → motive (succ o))
(isLimit : ∀ o, IsLimit o → (∀ o' < o, motive o') → motive o) : motive o := by
refine SuccOrder.limitRecOn o (fun a ha ↦ ?_) (fun a _ ↦ succ a) isLimit
convert zero
simpa using ha
@[simp]
theorem limitRecOn_zero {motive} (H₁ H₂ H₃) : @limitRecOn motive 0 H₁ H₂ H₃ = H₁ :=
SuccOrder.limitRecOn_isMin _ _ _ isMin_bot
@[simp]
theorem limitRecOn_succ {motive} (o H₁ H₂ H₃) :
@limitRecOn motive (succ o) H₁ H₂ H₃ = H₂ o (@limitRecOn motive o H₁ H₂ H₃) :=
SuccOrder.limitRecOn_succ ..
@[simp]
theorem limitRecOn_limit {motive} (o H₁ H₂ H₃ h) :
@limitRecOn motive o H₁ H₂ H₃ = H₃ o h fun x _h => @limitRecOn motive x H₁ H₂ H₃ :=
SuccOrder.limitRecOn_of_isSuccLimit ..
/-- Bounded recursion on ordinals. Similar to `limitRecOn`, with the assumption `o < l`
added to all cases. The final term's domain is the ordinals below `l`. -/
@[elab_as_elim]
def boundedLimitRecOn {l : Ordinal} (lLim : l.IsLimit) {motive : Iio l → Sort*} (o : Iio l)
(zero : motive ⟨0, lLim.pos⟩)
(succ : (o : Iio l) → motive o → motive ⟨succ o, lLim.succ_lt o.2⟩)
(isLimit : (o : Iio l) → IsLimit o → (Π o' < o, motive o') → motive o) : motive o :=
limitRecOn (motive := fun p ↦ (h : p < l) → motive ⟨p, h⟩) o.1 (fun _ ↦ zero)
(fun o ih h ↦ succ ⟨o, _⟩ <| ih <| (lt_succ o).trans h)
(fun _o ho ih _ ↦ isLimit _ ho fun _o' h ↦ ih _ h _) o.2
@[simp]
theorem boundedLimitRec_zero {l} (lLim : l.IsLimit) {motive} (H₁ H₂ H₃) :
@boundedLimitRecOn l lLim motive ⟨0, lLim.pos⟩ H₁ H₂ H₃ = H₁ := by
rw [boundedLimitRecOn, limitRecOn_zero]
@[simp]
theorem boundedLimitRec_succ {l} (lLim : l.IsLimit) {motive} (o H₁ H₂ H₃) :
@boundedLimitRecOn l lLim motive ⟨succ o.1, lLim.succ_lt o.2⟩ H₁ H₂ H₃ = H₂ o
(@boundedLimitRecOn l lLim motive o H₁ H₂ H₃) := by
rw [boundedLimitRecOn, limitRecOn_succ]
rfl
theorem boundedLimitRec_limit {l} (lLim : l.IsLimit) {motive} (o H₁ H₂ H₃ oLim) :
@boundedLimitRecOn l lLim motive o H₁ H₂ H₃ = H₃ o oLim (fun x _ ↦
@boundedLimitRecOn l lLim motive x H₁ H₂ H₃) := by
rw [boundedLimitRecOn, limitRecOn_limit]
rfl
instance orderTopToTypeSucc (o : Ordinal) : OrderTop (succ o).toType :=
@OrderTop.mk _ _ (Top.mk _) le_enum_succ
theorem enum_succ_eq_top {o : Ordinal} :
enum (α := (succ o).toType) (· < ·) ⟨o, type_toType _ ▸ lt_succ o⟩ = ⊤ :=
rfl
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.mpr _
· rw [enum_typein]
· rw [Subtype.mk_lt_mk, lt_succ_iff]
theorem toType_noMax_of_succ_lt {o : Ordinal} (ho : ∀ a < o, succ a < o) : NoMaxOrder o.toType :=
⟨has_succ_of_type_succ_lt (type_toType _ ▸ ho)⟩
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.succ_lt (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, Subtype.mk_lt_mk]
apply lt_succ
@[simp]
theorem typein_ordinal (o : Ordinal.{u}) :
@typein Ordinal (· < ·) _ o = Ordinal.lift.{u + 1} o := by
refine Quotient.inductionOn o ?_
rintro ⟨α, r, wo⟩; apply Quotient.sound
constructor; refine ((RelIso.preimage Equiv.ulift r).trans (enum r).symm).symm
theorem mk_Iio_ordinal (o : Ordinal.{u}) :
#(Iio o) = Cardinal.lift.{u + 1} o.card := by
rw [lift_card, ← typein_ordinal]
rfl
/-! ### Normal ordinal functions -/
/-- A normal ordinal function is a strictly increasing function which is
order-continuous, i.e., the image `f o` of a limit ordinal `o` is the sup of `f a` for
`a < o`. -/
def IsNormal (f : Ordinal → Ordinal) : Prop :=
(∀ o, f o < f (succ o)) ∧ ∀ o, IsLimit o → ∀ a, f o ≤ a ↔ ∀ b < o, f b ≤ a
theorem IsNormal.limit_le {f} (H : IsNormal f) :
∀ {o}, IsLimit o → ∀ {a}, f o ≤ a ↔ ∀ b < o, f b ≤ a :=
@H.2
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
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.succ_lt h))
theorem IsNormal.monotone {f} (H : IsNormal f) : Monotone f :=
H.strictMono.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⟩⟩⟩
theorem IsNormal.lt_iff {f} (H : IsNormal f) {a b} : f a < f b ↔ a < b :=
StrictMono.lt_iff_lt <| H.strictMono
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
theorem IsNormal.inj {f} (H : IsNormal f) {a b} : f a = f b ↔ a = b := by
simp only [le_antisymm_iff, H.le_iff]
theorem IsNormal.id_le {f} (H : IsNormal f) : id ≤ f :=
H.strictMono.id_le
theorem IsNormal.le_apply {f} (H : IsNormal f) {a} : a ≤ f a :=
H.strictMono.le_apply
theorem IsNormal.le_iff_eq {f} (H : IsNormal f) {a} : f a ≤ a ↔ f a = a :=
H.le_apply.le_iff_eq
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 _ pa => (H.le_iff.2 ((H₂ _).1 le_rfl _ pa)).trans h, fun h => by
induction b using limitRecOn with
| zero =>
obtain ⟨x, px⟩ := p0
have := Ordinal.le_zero.1 ((H₂ _).1 (Ordinal.zero_le _) _ px)
rw [this] at px
exact h _ px
| succ 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)
| isLimit 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)⟩
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
theorem IsNormal.refl : IsNormal id :=
⟨lt_succ, fun _o l _a => Ordinal.limit_le l⟩
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 _⟩
theorem IsNormal.isLimit {f} (H : IsNormal f) {o} (ho : IsLimit o) : IsLimit (f o) := by
rw [isLimit_iff, isSuccPrelimit_iff_succ_lt]
use (H.lt_iff.2 ho.pos).ne_bot
intro a ha
obtain ⟨b, hb, hab⟩ := (H.limit_lt ho).1 ha
rw [← succ_le_iff] at hab
apply hab.trans_lt
rwa [H.lt_iff]
theorem add_le_of_limit {a b c : Ordinal} (h : IsLimit b) :
a + b ≤ c ↔ ∀ b' < b, a + b' ≤ c :=
⟨fun h _ 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; rcases 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.succ_lt (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⟩
theorem isNormal_add_right (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⟩
theorem isLimit_add (a) {b} : IsLimit b → IsLimit (a + b) :=
(isNormal_add_right a).isLimit
alias IsLimit.add := isLimit_add
/-! ### Subtraction on ordinals -/
/-- The set in the definition of subtraction is nonempty. -/
private theorem sub_nonempty {a b : Ordinal} : { o | a ≤ b + o }.Nonempty :=
⟨a, le_add_left _ _⟩
/-- `a - b` is the unique ordinal satisfying `b + (a - b) = a` when `b ≤ a`. -/
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
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⟩
theorem lt_sub {a b c : Ordinal} : a < b - c ↔ c + a < b :=
lt_iff_lt_of_le_iff_le sub_le
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 _ _)
theorem sub_eq_of_add_eq {a b c : Ordinal} (h : a + b = c) : c - a = b :=
h ▸ add_sub_cancel _ _
theorem sub_le_self (a b : Ordinal) : a - b ≤ a :=
sub_le.2 <| le_add_left _ _
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)
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]
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)
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
@[simp]
theorem zero_sub (a : Ordinal) : 0 - a = 0 := by rw [← Ordinal.le_zero]; apply sub_le_self
@[simp]
theorem sub_self (a : Ordinal) : a - a = 0 := by simpa only [add_zero] using add_sub_cancel a 0
protected theorem sub_eq_zero_iff_le {a b : Ordinal} : a - b = 0 ↔ a ≤ b :=
⟨fun h => by simpa only [h, add_zero] using le_add_sub a b, fun h => by
rwa [← Ordinal.le_zero, sub_le, add_zero]⟩
protected theorem sub_ne_zero_iff_lt {a b : Ordinal} : a - b ≠ 0 ↔ b < a := by
simpa using Ordinal.sub_eq_zero_iff_le.not
theorem sub_sub (a b c : Ordinal) : a - b - c = a - (b + c) :=
eq_of_forall_ge_iff fun d => by rw [sub_le, sub_le, sub_le, add_assoc]
@[simp]
theorem add_sub_add_cancel (a b c : Ordinal) : a + b - (a + c) = b - c := by
rw [← sub_sub, add_sub_cancel]
theorem le_sub_of_add_le {a b c : Ordinal} (h : b + c ≤ a) : c ≤ a - b := by
rw [← add_le_add_iff_left b]
exact h.trans (le_add_sub a b)
theorem sub_lt_of_lt_add {a b c : Ordinal} (h : a < b + c) (hc : 0 < c) : a - b < c := by
obtain hab | hba := lt_or_le a b
· rwa [Ordinal.sub_eq_zero_iff_le.2 hab.le]
· rwa [sub_lt_of_le hba]
theorem lt_add_iff {a b c : Ordinal} (hc : c ≠ 0) : a < b + c ↔ ∃ d < c, a ≤ b + d := by
use fun h ↦ ⟨_, sub_lt_of_lt_add h hc.bot_lt, le_add_sub a b⟩
rintro ⟨d, hd, ha⟩
exact ha.trans_lt (add_lt_add_left hd b)
theorem add_le_iff {a b c : Ordinal} (hb : b ≠ 0) : a + b ≤ c ↔ ∀ d < b, a + d < c := by
simpa using (lt_add_iff hb).not
@[deprecated add_le_iff (since := "2024-12-08")]
theorem add_le_of_forall_add_lt {a b c : Ordinal} (hb : 0 < b) (h : ∀ d < b, a + d < c) :
a + b ≤ c :=
(add_le_iff hb.ne').2 h
theorem isLimit_sub {a b} (ha : IsLimit a) (h : b < a) : IsLimit (a - b) := by
rw [isLimit_iff, Ordinal.sub_ne_zero_iff_lt, isSuccPrelimit_iff_succ_lt]
refine ⟨h, fun c hc ↦ ?_⟩
rw [lt_sub] at hc ⊢
rw [add_succ]
exact ha.succ_lt hc
/-! ### Multiplication of ordinals -/
/-- The multiplication of ordinals `o₁` and `o₂` is the (well founded) lexicographic order on
`o₂ × o₁`. -/
instance monoid : Monoid Ordinal.{u} where
mul a b :=
Quotient.liftOn₂ a b
(fun ⟨α, r, _⟩ ⟨β, s, _⟩ => ⟦⟨β × α, Prod.Lex s r, inferInstance⟩⟧ :
WellOrder → WellOrder → Ordinal)
fun ⟨_, _, _⟩ _ _ _ ⟨f⟩ ⟨g⟩ => Quot.sound ⟨RelIso.prodLexCongr g f⟩
one := 1
mul_assoc a b c :=
Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ =>
Eq.symm <|
Quotient.sound
⟨⟨prodAssoc _ _ _, @fun a b => by
rcases a with ⟨⟨a₁, a₂⟩, a₃⟩
rcases b with ⟨⟨b₁, b₂⟩, b₃⟩
simp [Prod.lex_def, and_or_left, or_assoc, and_assoc]⟩⟩
mul_one a :=
inductionOn a fun α r _ =>
Quotient.sound
⟨⟨punitProd _, @fun a b => by
rcases a with ⟨⟨⟨⟩⟩, a⟩; rcases b with ⟨⟨⟨⟩⟩, b⟩
simp only [Prod.lex_def, EmptyRelation, false_or]
simp only [eq_self_iff_true, true_and]
rfl⟩⟩
one_mul a :=
inductionOn a fun α r _ =>
Quotient.sound
⟨⟨prodPUnit _, @fun a b => by
rcases a with ⟨a, ⟨⟨⟩⟩⟩; rcases b with ⟨b, ⟨⟨⟩⟩⟩
simp only [Prod.lex_def, EmptyRelation, and_false, or_false]
rfl⟩⟩
@[simp]
theorem type_prod_lex {α β : Type u} (r : α → α → Prop) (s : β → β → Prop) [IsWellOrder α r]
[IsWellOrder β s] : type (Prod.Lex s r) = type r * type s :=
rfl
private theorem mul_eq_zero' {a b : Ordinal} : a * b = 0 ↔ a = 0 ∨ b = 0 :=
inductionOn a fun α _ _ =>
inductionOn b fun β _ _ => by
simp_rw [← type_prod_lex, type_eq_zero_iff_isEmpty]
rw [or_comm]
exact isEmpty_prod
instance monoidWithZero : MonoidWithZero Ordinal :=
{ Ordinal.monoid with
zero := 0
mul_zero := fun _a => mul_eq_zero'.2 <| Or.inr rfl
zero_mul := fun _a => mul_eq_zero'.2 <| Or.inl rfl }
instance noZeroDivisors : NoZeroDivisors Ordinal :=
⟨fun {_ _} => mul_eq_zero'.1⟩
@[simp]
theorem lift_mul (a b : Ordinal.{v}) : lift.{u} (a * b) = lift.{u} a * lift.{u} b :=
Quotient.inductionOn₂ a b fun ⟨_α, _r, _⟩ ⟨_β, _s, _⟩ =>
Quotient.sound
⟨(RelIso.preimage Equiv.ulift _).trans
(RelIso.prodLexCongr (RelIso.preimage Equiv.ulift _)
(RelIso.preimage Equiv.ulift _)).symm⟩
@[simp]
theorem card_mul (a b) : card (a * b) = card a * card b :=
Quotient.inductionOn₂ a b fun ⟨α, _r, _⟩ ⟨β, _s, _⟩ => mul_comm #β #α
instance leftDistribClass : LeftDistribClass Ordinal.{u} :=
⟨fun a b c =>
Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ =>
Quotient.sound
⟨⟨sumProdDistrib _ _ _, by
rintro ⟨a₁ | a₁, a₂⟩ ⟨b₁ | b₁, b₂⟩ <;>
simp only [Prod.lex_def, Sum.lex_inl_inl, Sum.Lex.sep, Sum.lex_inr_inl, Sum.lex_inr_inr,
sumProdDistrib_apply_left, sumProdDistrib_apply_right, reduceCtorEq] <;>
-- Porting note: `Sum.inr.inj_iff` is required.
simp only [Sum.inl.inj_iff, Sum.inr.inj_iff, true_or, false_and, false_or]⟩⟩⟩
theorem mul_succ (a b : Ordinal) : a * succ b = a * b + a :=
mul_add_one a b
instance mulLeftMono : MulLeftMono Ordinal.{u} :=
⟨fun c a b =>
Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ ⟨f⟩ => by
refine
(RelEmbedding.ofMonotone (fun a : α × γ => (f a.1, a.2)) fun a b h => ?_).ordinal_type_le
obtain ⟨-, -, h'⟩ | ⟨-, h'⟩ := h
· exact Prod.Lex.left _ _ (f.toRelEmbedding.map_rel_iff.2 h')
· exact Prod.Lex.right _ h'⟩
instance mulRightMono : MulRightMono Ordinal.{u} :=
⟨fun c a b =>
Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ ⟨f⟩ => by
refine
(RelEmbedding.ofMonotone (fun a : γ × α => (a.1, f a.2)) fun a b h => ?_).ordinal_type_le
obtain ⟨-, -, h'⟩ | ⟨-, h'⟩ := h
· exact Prod.Lex.left _ _ h'
· exact Prod.Lex.right _ (f.toRelEmbedding.map_rel_iff.2 h')⟩
theorem le_mul_left (a : Ordinal) {b : Ordinal} (hb : 0 < b) : a ≤ a * b := by
convert mul_le_mul_left' (one_le_iff_pos.2 hb) a
rw [mul_one a]
theorem le_mul_right (a : Ordinal) {b : Ordinal} (hb : 0 < b) : a ≤ b * a := by
convert mul_le_mul_right' (one_le_iff_pos.2 hb) a
rw [one_mul a]
private theorem mul_le_of_limit_aux {α β r s} [IsWellOrder α r] [IsWellOrder β s] {c}
(h : IsLimit (type s)) (H : ∀ b' < type s, type r * b' ≤ c) (l : c < type r * type s) :
False := by
suffices ∀ a b, Prod.Lex s r (b, a) (enum _ ⟨_, l⟩) by
obtain ⟨b, a⟩ := enum _ ⟨_, l⟩
exact irrefl _ (this _ _)
intro a b
rw [← typein_lt_typein (Prod.Lex s r), typein_enum]
have := H _ (h.succ_lt (typein_lt_type s b))
rw [mul_succ] at this
have := ((add_lt_add_iff_left _).2 (typein_lt_type _ a)).trans_le this
refine (RelEmbedding.ofMonotone (fun a => ?_) fun a b => ?_).ordinal_type_le.trans_lt this
· rcases a with ⟨⟨b', a'⟩, h⟩
by_cases e : b = b'
· refine Sum.inr ⟨a', ?_⟩
subst e
obtain ⟨-, -, h⟩ | ⟨-, h⟩ := h
· exact (irrefl _ h).elim
· exact h
· refine Sum.inl (⟨b', ?_⟩, a')
obtain ⟨-, -, h⟩ | ⟨e, h⟩ := h
· exact h
· exact (e rfl).elim
· rcases a with ⟨⟨b₁, a₁⟩, h₁⟩
rcases b with ⟨⟨b₂, a₂⟩, h₂⟩
intro h
by_cases e₁ : b = b₁ <;> by_cases e₂ : b = b₂
· substs b₁ b₂
simpa only [subrel_val, Prod.lex_def, @irrefl _ s _ b, true_and, false_or,
eq_self_iff_true, dif_pos, Sum.lex_inr_inr] using h
· subst b₁
simp only [subrel_val, Prod.lex_def, e₂, Prod.lex_def, dif_pos, subrel_val, eq_self_iff_true,
or_false, dif_neg, not_false_iff, Sum.lex_inr_inl, false_and] at h ⊢
obtain ⟨-, -, h₂_h⟩ | e₂ := h₂ <;> [exact asymm h h₂_h; exact e₂ rfl]
· simp [e₂, dif_neg e₁, show b₂ ≠ b₁ from e₂ ▸ e₁]
· simpa only [dif_neg e₁, dif_neg e₂, Prod.lex_def, subrel_val, Subtype.mk_eq_mk,
Sum.lex_inl_inl] using h
theorem mul_le_of_limit {a b c : Ordinal} (h : IsLimit b) : a * b ≤ c ↔ ∀ b' < b, a * b' ≤ c :=
⟨fun h _ l => (mul_le_mul_left' l.le _).trans h, fun H =>
-- Porting note: `induction` tactics are required because of the parser bug.
le_of_not_lt <| by
induction a using inductionOn with
| H α r =>
induction b using inductionOn with
| H β s =>
exact mul_le_of_limit_aux h H⟩
theorem isNormal_mul_right {a : Ordinal} (h : 0 < a) : IsNormal (a * ·) :=
-- Porting note (https://github.com/leanprover-community/mathlib4/issues/12129): additional beta reduction needed
⟨fun b => by
beta_reduce
rw [mul_succ]
simpa only [add_zero] using (add_lt_add_iff_left (a * b)).2 h,
fun _ l _ => mul_le_of_limit l⟩
theorem lt_mul_of_limit {a b c : Ordinal} (h : IsLimit c) : a < b * c ↔ ∃ c' < c, a < b * c' := by
-- Porting note: `bex_def` is required.
simpa only [not_forall₂, not_le, bex_def] using not_congr (@mul_le_of_limit b c a h)
theorem mul_lt_mul_iff_left {a b c : Ordinal} (a0 : 0 < a) : a * b < a * c ↔ b < c :=
(isNormal_mul_right a0).lt_iff
theorem mul_le_mul_iff_left {a b c : Ordinal} (a0 : 0 < a) : a * b ≤ a * c ↔ b ≤ c :=
(isNormal_mul_right a0).le_iff
theorem mul_lt_mul_of_pos_left {a b c : Ordinal} (h : a < b) (c0 : 0 < c) : c * a < c * b :=
(mul_lt_mul_iff_left c0).2 h
theorem mul_pos {a b : Ordinal} (h₁ : 0 < a) (h₂ : 0 < b) : 0 < a * b := by
simpa only [mul_zero] using mul_lt_mul_of_pos_left h₂ h₁
theorem mul_ne_zero {a b : Ordinal} : a ≠ 0 → b ≠ 0 → a * b ≠ 0 := by
simpa only [Ordinal.pos_iff_ne_zero] using mul_pos
theorem le_of_mul_le_mul_left {a b c : Ordinal} (h : c * a ≤ c * b) (h0 : 0 < c) : a ≤ b :=
le_imp_le_of_lt_imp_lt (fun h' => mul_lt_mul_of_pos_left h' h0) h
theorem mul_right_inj {a b c : Ordinal} (a0 : 0 < a) : a * b = a * c ↔ b = c :=
(isNormal_mul_right a0).inj
theorem isLimit_mul {a b : Ordinal} (a0 : 0 < a) : IsLimit b → IsLimit (a * b) :=
(isNormal_mul_right a0).isLimit
theorem isLimit_mul_left {a b : Ordinal} (l : IsLimit a) (b0 : 0 < b) : IsLimit (a * b) := by
rcases zero_or_succ_or_limit b with (rfl | ⟨b, rfl⟩ | lb)
· exact b0.false.elim
· rw [mul_succ]
exact isLimit_add _ l
· exact isLimit_mul l.pos lb
theorem smul_eq_mul : ∀ (n : ℕ) (a : Ordinal), n • a = a * n
| 0, a => by rw [zero_nsmul, Nat.cast_zero, mul_zero]
| n + 1, a => by rw [succ_nsmul, Nat.cast_add, mul_add, Nat.cast_one, mul_one, smul_eq_mul n]
private theorem add_mul_limit_aux {a b c : Ordinal} (ba : b + a = a) (l : IsLimit c)
(IH : ∀ c' < c, (a + b) * succ c' = a * succ c' + b) : (a + b) * c = a * c :=
le_antisymm
((mul_le_of_limit l).2 fun c' h => by
apply (mul_le_mul_left' (le_succ c') _).trans
rw [IH _ h]
apply (add_le_add_left _ _).trans
· rw [← mul_succ]
exact mul_le_mul_left' (succ_le_of_lt <| l.succ_lt h) _
· rw [← ba]
exact le_add_right _ _)
(mul_le_mul_right' (le_add_right _ _) _)
theorem add_mul_succ {a b : Ordinal} (c) (ba : b + a = a) : (a + b) * succ c = a * succ c + b := by
induction c using limitRecOn with
| zero => simp only [succ_zero, mul_one]
| succ c IH =>
rw [mul_succ, IH, ← add_assoc, add_assoc _ b, ba, ← mul_succ]
| isLimit c l IH =>
rw [mul_succ, add_mul_limit_aux ba l IH, mul_succ, add_assoc]
theorem add_mul_limit {a b c : Ordinal} (ba : b + a = a) (l : IsLimit c) : (a + b) * c = a * c :=
add_mul_limit_aux ba l fun c' _ => add_mul_succ c' ba
/-! ### Division on ordinals -/
/-- The set in the definition of division is nonempty. -/
private theorem div_nonempty {a b : Ordinal} (h : b ≠ 0) : { o | a < b * succ o }.Nonempty :=
⟨a, (succ_le_iff (a := a) (b := b * succ a)).1 <| by
simpa only [succ_zero, one_mul] using
mul_le_mul_right' (succ_le_of_lt (Ordinal.pos_iff_ne_zero.2 h)) (succ a)⟩
/-- `a / b` is the unique ordinal `o` satisfying `a = b * o + o'` with `o' < b`. -/
instance div : Div Ordinal :=
⟨fun a b => if b = 0 then 0 else sInf { o | a < b * succ o }⟩
@[simp]
theorem div_zero (a : Ordinal) : a / 0 = 0 :=
dif_pos rfl
private theorem div_def (a) {b : Ordinal} (h : b ≠ 0) : a / b = sInf { o | a < b * succ o } :=
dif_neg h
| theorem lt_mul_succ_div (a) {b : Ordinal} (h : b ≠ 0) : a < b * succ (a / b) := by
rw [div_def a h]; exact csInf_mem (div_nonempty h)
| Mathlib/SetTheory/Ordinal/Arithmetic.lean | 829 | 830 |
/-
Copyright (c) 2020 Anne Baanen. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Anne Baanen, Devon Tuma
-/
import Mathlib.Algebra.GroupWithZero.NonZeroDivisors
import Mathlib.Algebra.Polynomial.AlgebraMap
import Mathlib.RingTheory.Coprime.Basic
import Mathlib.Tactic.AdaptationNote
/-!
# Scaling the roots of a polynomial
This file defines `scaleRoots p s` for a polynomial `p` in one variable and a ring element `s` to
be the polynomial with root `r * s` for each root `r` of `p` and proves some basic results about it.
-/
variable {R S A K : Type*}
namespace Polynomial
section Semiring
variable [Semiring R] [Semiring S]
/-- `scaleRoots p s` is a polynomial with root `r * s` for each root `r` of `p`. -/
noncomputable def scaleRoots (p : R[X]) (s : R) : R[X] :=
∑ i ∈ p.support, monomial i (p.coeff i * s ^ (p.natDegree - i))
@[simp]
theorem coeff_scaleRoots (p : R[X]) (s : R) (i : ℕ) :
(scaleRoots p s).coeff i = coeff p i * s ^ (p.natDegree - i) := by
simp +contextual [scaleRoots, coeff_monomial]
theorem coeff_scaleRoots_natDegree (p : R[X]) (s : R) :
(scaleRoots p s).coeff p.natDegree = p.leadingCoeff := by
rw [leadingCoeff, coeff_scaleRoots, tsub_self, pow_zero, mul_one]
@[simp]
theorem zero_scaleRoots (s : R) : scaleRoots 0 s = 0 := by
ext
simp
theorem scaleRoots_ne_zero {p : R[X]} (hp : p ≠ 0) (s : R) : scaleRoots p s ≠ 0 := by
intro h
have : p.coeff p.natDegree ≠ 0 := mt leadingCoeff_eq_zero.mp hp
have : (scaleRoots p s).coeff p.natDegree = 0 :=
congr_fun (congr_arg (coeff : R[X] → ℕ → R) h) p.natDegree
rw [coeff_scaleRoots_natDegree] at this
contradiction
theorem support_scaleRoots_le (p : R[X]) (s : R) : (scaleRoots p s).support ≤ p.support := by
intro
simpa using left_ne_zero_of_mul
theorem support_scaleRoots_eq (p : R[X]) {s : R} (hs : s ∈ nonZeroDivisors R) :
(scaleRoots p s).support = p.support :=
le_antisymm (support_scaleRoots_le p s)
(by intro i
simp only [coeff_scaleRoots, Polynomial.mem_support_iff]
intro p_ne_zero ps_zero
have := pow_mem hs (p.natDegree - i) _ ps_zero
contradiction)
@[simp]
theorem degree_scaleRoots (p : R[X]) {s : R} : degree (scaleRoots p s) = degree p := by
haveI := Classical.propDecidable
by_cases hp : p = 0
· rw [hp, zero_scaleRoots]
refine le_antisymm (Finset.sup_mono (support_scaleRoots_le p s)) (degree_le_degree ?_)
rw [coeff_scaleRoots_natDegree]
intro h
have := leadingCoeff_eq_zero.mp h
contradiction
@[simp]
theorem natDegree_scaleRoots (p : R[X]) (s : R) : natDegree (scaleRoots p s) = natDegree p := by
simp only [natDegree, degree_scaleRoots]
theorem monic_scaleRoots_iff {p : R[X]} (s : R) : Monic (scaleRoots p s) ↔ Monic p := by
simp only [Monic, leadingCoeff, natDegree_scaleRoots, coeff_scaleRoots_natDegree]
theorem map_scaleRoots (p : R[X]) (x : R) (f : R →+* S) (h : f p.leadingCoeff ≠ 0) :
(p.scaleRoots x).map f = (p.map f).scaleRoots (f x) := by
ext
simp [Polynomial.natDegree_map_of_leadingCoeff_ne_zero _ h]
@[simp]
lemma scaleRoots_C (r c : R) : (C c).scaleRoots r = C c := by
ext; simp
@[simp]
lemma scaleRoots_one (p : R[X]) :
p.scaleRoots 1 = p := by ext; simp
@[simp]
lemma scaleRoots_zero (p : R[X]) :
p.scaleRoots 0 = p.leadingCoeff • X ^ p.natDegree := by
ext n
simp only [coeff_scaleRoots, ne_eq, tsub_eq_zero_iff_le, not_le, zero_pow_eq, mul_ite,
mul_one, mul_zero, coeff_smul, coeff_X_pow, smul_eq_mul]
split_ifs with h₁ h₂ h₂
· subst h₂; rfl
· exact coeff_eq_zero_of_natDegree_lt (lt_of_le_of_ne h₁ (Ne.symm h₂))
· exact (h₁ h₂.ge).elim
· rfl
@[simp]
lemma one_scaleRoots (r : R) :
(1 : R[X]).scaleRoots r = 1 := by ext; simp
end Semiring
section CommSemiring
variable [Semiring S] [CommSemiring R] [Semiring A] [Field K]
theorem scaleRoots_eval₂_mul_of_commute {p : S[X]} (f : S →+* A) (a : A) (s : S)
(hsa : Commute (f s) a) (hf : ∀ s₁ s₂, Commute (f s₁) (f s₂)) :
eval₂ f (f s * a) (scaleRoots p s) = f s ^ p.natDegree * eval₂ f a p := by
calc
_ = (scaleRoots p s).support.sum fun i =>
f (coeff p i * s ^ (p.natDegree - i)) * (f s * a) ^ i := by
simp [eval₂_eq_sum, sum_def]
_ = p.support.sum fun i => f (coeff p i * s ^ (p.natDegree - i)) * (f s * a) ^ i :=
(Finset.sum_subset (support_scaleRoots_le p s) fun i _hi hi' => by
let this : coeff p i * s ^ (p.natDegree - i) = 0 := by simpa using hi'
simp [this])
_ = p.support.sum fun i : ℕ => f (p.coeff i) * f s ^ (p.natDegree - i + i) * a ^ i :=
(Finset.sum_congr rfl fun i _hi => by
simp_rw [f.map_mul, f.map_pow, pow_add, hsa.mul_pow, mul_assoc])
_ = p.support.sum fun i : ℕ => f s ^ p.natDegree * (f (p.coeff i) * a ^ i) :=
Finset.sum_congr rfl fun i hi => by
rw [mul_assoc, ← map_pow, (hf _ _).left_comm, map_pow, tsub_add_cancel_of_le]
exact le_natDegree_of_ne_zero (Polynomial.mem_support_iff.mp hi)
_ = f s ^ p.natDegree * eval₂ f a p := by simp [← Finset.mul_sum, eval₂_eq_sum, sum_def]
theorem scaleRoots_eval₂_mul {p : S[X]} (f : S →+* R) (r : R) (s : S) :
eval₂ f (f s * r) (scaleRoots p s) = f s ^ p.natDegree * eval₂ f r p :=
scaleRoots_eval₂_mul_of_commute f r s (mul_comm _ _) fun _ _ ↦ mul_comm _ _
theorem scaleRoots_eval₂_eq_zero {p : S[X]} (f : S →+* R) {r : R} {s : S} (hr : eval₂ f r p = 0) :
eval₂ f (f s * r) (scaleRoots p s) = 0 := by rw [scaleRoots_eval₂_mul, hr, mul_zero]
theorem scaleRoots_aeval_eq_zero [Algebra R A] {p : R[X]} {a : A} {r : R} (ha : aeval a p = 0) :
aeval (algebraMap R A r * a) (scaleRoots p r) = 0 := by
rw [aeval_def, scaleRoots_eval₂_mul_of_commute, ← aeval_def, ha, mul_zero]
· apply Algebra.commutes
· intros; rw [Commute, SemiconjBy, ← map_mul, ← map_mul, mul_comm]
theorem scaleRoots_eval₂_eq_zero_of_eval₂_div_eq_zero {p : S[X]} {f : S →+* K}
(hf : Function.Injective f) {r s : S} (hr : eval₂ f (f r / f s) p = 0)
(hs : s ∈ nonZeroDivisors S) : eval₂ f (f r) (scaleRoots p s) = 0 := by
-- if we don't specify the type with `(_ : S)`, the proof is much slower
nontriviality S using Subsingleton.eq_zero (_ : S)
convert @scaleRoots_eval₂_eq_zero _ _ _ _ p f _ s hr
rw [← mul_div_assoc, mul_comm, mul_div_cancel_right₀]
exact map_ne_zero_of_mem_nonZeroDivisors _ hf hs
theorem scaleRoots_aeval_eq_zero_of_aeval_div_eq_zero [Algebra R K]
(inj : Function.Injective (algebraMap R K)) {p : R[X]} {r s : R}
(hr : aeval (algebraMap R K r / algebraMap R K s) p = 0) (hs : s ∈ nonZeroDivisors R) :
aeval (algebraMap R K r) (scaleRoots p s) = 0 :=
scaleRoots_eval₂_eq_zero_of_eval₂_div_eq_zero inj hr hs
@[simp]
lemma scaleRoots_mul (p : R[X]) (r s) :
p.scaleRoots (r * s) = (p.scaleRoots r).scaleRoots s := by
ext; simp [mul_pow, mul_assoc]
/-- Multiplication and `scaleRoots` commute up to a power of `r`. The factor disappears if we
assume that the product of the leading coeffs does not vanish. See `Polynomial.mul_scaleRoots'`. -/
lemma mul_scaleRoots (p q : R[X]) (r : R) :
r ^ (natDegree p + natDegree q - natDegree (p * q)) • (p * q).scaleRoots r =
p.scaleRoots r * q.scaleRoots r := by
ext n; simp only [coeff_scaleRoots, coeff_smul, smul_eq_mul]
trans (∑ x ∈ Finset.antidiagonal n, coeff p x.1 * coeff q x.2) *
r ^ (natDegree p + natDegree q - n)
· rw [← coeff_mul]
cases lt_or_le (natDegree (p * q)) n with
| inl h => simp only [coeff_eq_zero_of_natDegree_lt h, zero_mul, mul_zero]
| inr h =>
rw [mul_comm, mul_assoc, ← pow_add, add_comm, tsub_add_tsub_cancel natDegree_mul_le h]
· rw [coeff_mul, Finset.sum_mul]
apply Finset.sum_congr rfl
simp only [Finset.mem_antidiagonal, coeff_scaleRoots, Prod.forall]
intros a b e
cases lt_or_le (natDegree p) a with
| inl h => simp only [coeff_eq_zero_of_natDegree_lt h, zero_mul, mul_zero]
| inr ha =>
cases lt_or_le (natDegree q) b with
| inl h => simp only [coeff_eq_zero_of_natDegree_lt h, zero_mul, mul_zero]
| inr hb =>
simp only [← e, mul_assoc, mul_comm (r ^ (_ - a)), ← pow_add]
rw [add_comm (_ - _), tsub_add_tsub_comm ha hb]
lemma mul_scaleRoots' (p q : R[X]) (r : R) (h : leadingCoeff p * leadingCoeff q ≠ 0) :
(p * q).scaleRoots r = p.scaleRoots r * q.scaleRoots r := by
rw [← mul_scaleRoots, natDegree_mul' h, tsub_self, pow_zero, one_smul]
lemma mul_scaleRoots_of_noZeroDivisors (p q : R[X]) (r : R) [NoZeroDivisors R] :
(p * q).scaleRoots r = p.scaleRoots r * q.scaleRoots r := by
by_cases hp : p = 0; · simp [hp]
by_cases hq : q = 0; · simp [hq]
apply mul_scaleRoots'
simp only [ne_eq, mul_eq_zero, leadingCoeff_eq_zero, hp, hq, or_self, not_false_eq_true]
lemma add_scaleRoots_of_natDegree_eq (p q : R[X]) (r : R) (h : natDegree p = natDegree q) :
r ^ (natDegree p - natDegree (p + q)) • (p + q).scaleRoots r =
p.scaleRoots r + q.scaleRoots r := by
ext n; simp only [coeff_smul, coeff_scaleRoots, coeff_add, smul_eq_mul,
mul_comm (r ^ _), ← pow_add, ← h, ← add_mul, add_comm (_ - n)]
#adaptation_note /-- v4.7.0-rc1
Previously `mul_assoc` was part of the `simp only` above, and this `rw` was not needed.
but this now causes a max rec depth error. -/
rw [mul_assoc, ← pow_add]
cases lt_or_le (natDegree (p + q)) n with
| inl hn => simp only [← coeff_add, coeff_eq_zero_of_natDegree_lt hn, zero_mul]
| inr hn =>
rw [add_comm (_ - n), tsub_add_tsub_cancel (natDegree_add_le_of_degree_le le_rfl h.ge) hn]
| lemma scaleRoots_dvd' (p q : R[X]) {r : R} (hr : IsUnit r)
(hpq : p ∣ q) : p.scaleRoots r ∣ q.scaleRoots r := by
obtain ⟨a, rfl⟩ := hpq
rw [← ((hr.pow (natDegree p + natDegree a - natDegree (p * a))).map
(algebraMap R R[X])).dvd_mul_left, ← Algebra.smul_def, mul_scaleRoots]
exact dvd_mul_right (scaleRoots p r) (scaleRoots a r)
| Mathlib/RingTheory/Polynomial/ScaleRoots.lean | 223 | 228 |
/-
Copyright (c) 2017 Microsoft Corporation. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Mario Carneiro
-/
import Mathlib.Data.WSeq.Basic
import Mathlib.Data.WSeq.Defs
import Mathlib.Data.WSeq.Productive
import Mathlib.Data.WSeq.Relation
deprecated_module (since := "2025-04-13")
| Mathlib/Data/Seq/WSeq.lean | 759 | 762 | |
/-
Copyright (c) 2021 Julian Kuelshammer. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Julian Kuelshammer
-/
import Mathlib.GroupTheory.OrderOfElement
import Mathlib.Algebra.GCDMonoid.Finset
import Mathlib.Algebra.GCDMonoid.Nat
import Mathlib.Data.Nat.Factorization.Basic
import Mathlib.Tactic.Peel
import Mathlib.Algebra.Order.BigOperators.Ring.Finset
/-!
# Exponent of a group
This file defines the exponent of a group, or more generally a monoid. For a group `G` it is defined
to be the minimal `n≥1` such that `g ^ n = 1` for all `g ∈ G`. For a finite group `G`,
it is equal to the lowest common multiple of the order of all elements of the group `G`.
## Main definitions
* `Monoid.ExponentExists` is a predicate on a monoid `G` saying that there is some positive `n`
such that `g ^ n = 1` for all `g ∈ G`.
* `Monoid.exponent` defines the exponent of a monoid `G` as the minimal positive `n` such that
`g ^ n = 1` for all `g ∈ G`, by convention it is `0` if no such `n` exists.
* `AddMonoid.ExponentExists` the additive version of `Monoid.ExponentExists`.
* `AddMonoid.exponent` the additive version of `Monoid.exponent`.
## Main results
* `Monoid.lcm_order_eq_exponent`: For a finite left cancel monoid `G`, the exponent is equal to the
`Finset.lcm` of the order of its elements.
* `Monoid.exponent_eq_iSup_orderOf(')`: For a commutative cancel monoid, the exponent is
equal to `⨆ g : G, orderOf g` (or zero if it has any order-zero elements).
* `Monoid.exponent_pi` and `Monoid.exponent_prod`: The exponent of a finite product of monoids is
the least common multiple (`Finset.lcm` and `lcm`, respectively) of the exponents of the
constituent monoids.
* `MonoidHom.exponent_dvd`: If `f : M₁ →⋆ M₂` is surjective, then the exponent of `M₂` divides the
exponent of `M₁`.
## TODO
* Refactor the characteristic of a ring to be the exponent of its underlying additive group.
-/
universe u
variable {G : Type u}
namespace Monoid
section Monoid
variable (G) [Monoid G]
/-- A predicate on a monoid saying that there is a positive integer `n` such that `g ^ n = 1`
for all `g`. -/
@[to_additive
"A predicate on an additive monoid saying that there is a positive integer `n` such\n
that `n • g = 0` for all `g`."]
def ExponentExists :=
∃ n, 0 < n ∧ ∀ g : G, g ^ n = 1
open scoped Classical in
/-- The exponent of a group is the smallest positive integer `n` such that `g ^ n = 1` for all
`g ∈ G` if it exists, otherwise it is zero by convention. -/
@[to_additive
"The exponent of an additive group is the smallest positive integer `n` such that\n
`n • g = 0` for all `g ∈ G` if it exists, otherwise it is zero by convention."]
noncomputable def exponent :=
if h : ExponentExists G then Nat.find h else 0
variable {G}
@[simp]
theorem _root_.AddMonoid.exponent_additive :
AddMonoid.exponent (Additive G) = exponent G := rfl
@[simp]
theorem exponent_multiplicative {G : Type*} [AddMonoid G] :
exponent (Multiplicative G) = AddMonoid.exponent G := rfl
open MulOpposite in
@[to_additive (attr := simp)]
theorem _root_.MulOpposite.exponent : exponent (MulOpposite G) = exponent G := by
simp only [Monoid.exponent, ExponentExists]
congr!
all_goals exact ⟨(op_injective <| · <| op ·), (unop_injective <| · <| unop ·)⟩
@[to_additive]
theorem ExponentExists.isOfFinOrder (h : ExponentExists G) {g : G} : IsOfFinOrder g :=
isOfFinOrder_iff_pow_eq_one.mpr <| by peel 2 h; exact this g
@[to_additive]
theorem ExponentExists.orderOf_pos (h : ExponentExists G) (g : G) : 0 < orderOf g :=
h.isOfFinOrder.orderOf_pos
@[to_additive]
theorem exponent_ne_zero : exponent G ≠ 0 ↔ ExponentExists G := by
rw [exponent]
split_ifs with h
· simp [h, @not_lt_zero' ℕ]
--if this isn't done this way, `to_additive` freaks
· tauto
@[to_additive]
protected alias ⟨_, ExponentExists.exponent_ne_zero⟩ := exponent_ne_zero
@[to_additive]
theorem exponent_pos : 0 < exponent G ↔ ExponentExists G :=
pos_iff_ne_zero.trans exponent_ne_zero
@[to_additive]
protected alias ⟨_, ExponentExists.exponent_pos⟩ := exponent_pos
@[to_additive]
theorem exponent_eq_zero_iff : exponent G = 0 ↔ ¬ExponentExists G :=
exponent_ne_zero.not_right
@[to_additive exponent_eq_zero_addOrder_zero]
theorem exponent_eq_zero_of_order_zero {g : G} (hg : orderOf g = 0) : exponent G = 0 :=
exponent_eq_zero_iff.mpr fun h ↦ h.orderOf_pos g |>.ne' hg
/-- The exponent is zero iff for all nonzero `n`, one can find a `g` such that `g ^ n ≠ 1`. -/
@[to_additive "The exponent is zero iff for all nonzero `n`, one can find a `g` such that
`n • g ≠ 0`."]
theorem exponent_eq_zero_iff_forall : exponent G = 0 ↔ ∀ n > 0, ∃ g : G, g ^ n ≠ 1 := by
rw [exponent_eq_zero_iff, ExponentExists]
push_neg
rfl
@[to_additive exponent_nsmul_eq_zero]
theorem pow_exponent_eq_one (g : G) : g ^ exponent G = 1 := by
classical
by_cases h : ExponentExists G
· simp_rw [exponent, dif_pos h]
exact (Nat.find_spec h).2 g
· simp_rw [exponent, dif_neg h, pow_zero]
@[to_additive]
theorem pow_eq_mod_exponent {n : ℕ} (g : G) : g ^ n = g ^ (n % exponent G) :=
calc
| g ^ n = g ^ (n % exponent G + exponent G * (n / exponent G)) := by rw [Nat.mod_add_div]
_ = g ^ (n % exponent G) := by simp [pow_add, pow_mul, pow_exponent_eq_one]
@[to_additive]
| Mathlib/GroupTheory/Exponent.lean | 143 | 146 |
/-
Copyright (c) 2017 Mario Carneiro. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Mario Carneiro
-/
import Mathlib.Control.Combinators
import Mathlib.Data.Option.Defs
import Mathlib.Logic.IsEmpty
import Mathlib.Logic.Relator
import Mathlib.Util.CompileInductive
import Aesop
/-!
# Option of a type
This file develops the basic theory of option types.
If `α` is a type, then `Option α` can be understood as the type with one more element than `α`.
`Option α` has terms `some a`, where `a : α`, and `none`, which is the added element.
This is useful in multiple ways:
* It is the prototype of addition of terms to a type. See for example `WithBot α` which uses
`none` as an element smaller than all others.
* It can be used to define failsafe partial functions, which return `some the_result_we_expect`
if we can find `the_result_we_expect`, and `none` if there is no meaningful result. This forces
any subsequent use of the partial function to explicitly deal with the exceptions that make it
return `none`.
* `Option` is a monad. We love monads.
`Part` is an alternative to `Option` that can be seen as the type of `True`/`False` values
along with a term `a : α` if the value is `True`.
-/
universe u
namespace Option
variable {α β γ δ : Type*}
theorem coe_def : (fun a ↦ ↑a : α → Option α) = some :=
rfl
theorem mem_map {f : α → β} {y : β} {o : Option α} : y ∈ o.map f ↔ ∃ x ∈ o, f x = y := by simp
-- The simpNF linter says that the LHS can be simplified via `Option.mem_def`.
-- However this is a higher priority lemma.
-- It seems the side condition `H` is not applied by `simpNF`.
-- https://github.com/leanprover/std4/issues/207
@[simp 1100, nolint simpNF]
theorem mem_map_of_injective {f : α → β} (H : Function.Injective f) {a : α} {o : Option α} :
f a ∈ o.map f ↔ a ∈ o := by
aesop
theorem forall_mem_map {f : α → β} {o : Option α} {p : β → Prop} :
(∀ y ∈ o.map f, p y) ↔ ∀ x ∈ o, p (f x) := by simp
theorem exists_mem_map {f : α → β} {o : Option α} {p : β → Prop} :
(∃ y ∈ o.map f, p y) ↔ ∃ x ∈ o, p (f x) := by simp
theorem coe_get {o : Option α} (h : o.isSome) : ((Option.get _ h : α) : Option α) = o :=
Option.some_get h
theorem eq_of_mem_of_mem {a : α} {o1 o2 : Option α} (h1 : a ∈ o1) (h2 : a ∈ o2) : o1 = o2 :=
h1.trans h2.symm
theorem Mem.leftUnique : Relator.LeftUnique ((· ∈ ·) : α → Option α → Prop) :=
fun _ _ _=> mem_unique
theorem some_injective (α : Type*) : Function.Injective (@some α) := fun _ _ ↦ some_inj.mp
/-- `Option.map f` is injective if `f` is injective. -/
theorem map_injective {f : α → β} (Hf : Function.Injective f) : Function.Injective (Option.map f)
| none, none, _ => rfl
| some a₁, some a₂, H => by rw [Hf (Option.some.inj H)]
@[simp]
theorem map_comp_some (f : α → β) : Option.map f ∘ some = some ∘ f :=
rfl
@[simp]
theorem none_bind' (f : α → Option β) : none.bind f = none :=
rfl
@[simp]
theorem some_bind' (a : α) (f : α → Option β) : (some a).bind f = f a :=
rfl
theorem bind_eq_some' {x : Option α} {f : α → Option β} {b : β} :
x.bind f = some b ↔ ∃ a, x = some a ∧ f a = some b := by
cases x <;> simp
@[congr]
theorem bind_congr' {f g : α → Option β} {x y : Option α} (hx : x = y)
(hf : ∀ a ∈ y, f a = g a) : x.bind f = y.bind g :=
hx.symm ▸ bind_congr hf
@[deprecated bind_congr (since := "2025-03-20")]
-- This was renamed from `bind_congr` after https://github.com/leanprover/lean4/pull/7529
-- upstreamed it with a slightly different statement.
theorem bind_congr'' {f g : α → Option β} {x : Option α}
(h : ∀ a ∈ x, f a = g a) : x.bind f = x.bind g := by
cases x <;> simp only [some_bind, none_bind, mem_def, h]
theorem joinM_eq_join : joinM = @join α :=
funext fun _ ↦ rfl
theorem bind_eq_bind' {α β : Type u} {f : α → Option β} {x : Option α} : x >>= f = x.bind f :=
rfl
theorem map_coe {α β} {a : α} {f : α → β} : f <$> (a : Option α) = ↑(f a) :=
rfl
@[simp]
theorem map_coe' {a : α} {f : α → β} : Option.map f (a : Option α) = ↑(f a) :=
rfl
/-- `Option.map` as a function between functions is injective. -/
theorem map_injective' : Function.Injective (@Option.map α β) := fun f g h ↦
funext fun x ↦ some_injective _ <| by simp only [← map_some', h]
@[simp]
theorem map_inj {f g : α → β} : Option.map f = Option.map g ↔ f = g :=
map_injective'.eq_iff
attribute [simp] map_id
@[simp]
theorem map_eq_id {f : α → α} : Option.map f = id ↔ f = id :=
map_injective'.eq_iff' map_id
theorem map_comm {f₁ : α → β} {f₂ : α → γ} {g₁ : β → δ} {g₂ : γ → δ} (h : g₁ ∘ f₁ = g₂ ∘ f₂)
(a : α) :
(Option.map f₁ a).map g₁ = (Option.map f₂ a).map g₂ := by rw [map_map, h, ← map_map]
section pmap
variable {p : α → Prop} (f : ∀ a : α, p a → β) (x : Option α)
@[simp]
theorem pbind_eq_bind (f : α → Option β) (x : Option α) : (x.pbind fun a _ ↦ f a) = x.bind f := by
cases x <;> simp only [pbind, none_bind', some_bind']
theorem map_bind' (f : β → γ) (x : Option α) (g : α → Option β) :
Option.map f (x.bind g) = x.bind fun a ↦ Option.map f (g a) := by cases x <;> simp
theorem pbind_map (f : α → β) (x : Option α) (g : ∀ b : β, b ∈ x.map f → Option γ) :
pbind (Option.map f x) g = x.pbind fun a h ↦ g (f a) (mem_map_of_mem _ h) := by cases x <;> rfl
theorem mem_pmem {a : α} (h : ∀ a ∈ x, p a) (ha : a ∈ x) : f a (h a ha) ∈ pmap f x h := by
rw [mem_def] at ha ⊢
subst ha
rfl
theorem pmap_bind {α β γ} {x : Option α} {g : α → Option β} {p : β → Prop} {f : ∀ b, p b → γ} (H)
(H' : ∀ (a : α), ∀ b ∈ g a, b ∈ x >>= g) :
pmap f (x >>= g) H = x >>= fun a ↦ pmap f (g a) fun _ h ↦ H _ (H' a _ h) := by
cases x <;> simp only [pmap, bind_eq_bind, none_bind, some_bind]
theorem bind_pmap {α β γ} {p : α → Prop} (f : ∀ a, p a → β) (x : Option α) (g : β → Option γ) (H) :
pmap f x H >>= g = x.pbind fun a h ↦ g (f a (H _ h)) := by
cases x <;> simp only [pmap, bind_eq_bind, none_bind, some_bind, pbind]
variable {f x}
theorem pbind_eq_none {f : ∀ a : α, a ∈ x → Option β}
(h' : ∀ a (H : a ∈ x), f a H = none → x = none) : x.pbind f = none ↔ x = none := by
cases x
· simp
· simp only [pbind, iff_false, reduceCtorEq]
intro h
cases h' _ rfl h
theorem pbind_eq_some {f : ∀ a : α, a ∈ x → Option β} {y : β} :
x.pbind f = some y ↔ ∃ (z : α) (H : z ∈ x), f z H = some y := by
rcases x with (_|x)
· simp
· simp only [pbind]
refine ⟨fun h ↦ ⟨x, rfl, h⟩, ?_⟩
rintro ⟨z, H, hz⟩
simp only [mem_def, Option.some_inj] at H
simpa [H] using hz
theorem join_pmap_eq_pmap_join {f : ∀ a, p a → β} {x : Option (Option α)} (H) :
(pmap (pmap f) x H).join = pmap f x.join fun a h ↦ H (some a) (mem_of_mem_join h) _ rfl := by
rcases x with (_ | _ | x) <;> simp
/-- `simp`-normal form of `join_pmap_eq_pmap_join` -/
@[simp]
theorem pmap_bind_id_eq_pmap_join {f : ∀ a, p a → β} {x : Option (Option α)} (H) :
((pmap (pmap f) x H).bind fun a ↦ a) =
pmap f x.join fun a h ↦ H (some a) (mem_of_mem_join h) _ rfl := by
rcases x with (_ | _ | x) <;> simp
end pmap
@[simp]
theorem seq_some {α β} {a : α} {f : α → β} : some f <*> some a = some (f a) :=
rfl
@[simp]
theorem some_orElse' (a : α) (x : Option α) : (some a).orElse (fun _ ↦ x) = some a :=
rfl
@[simp]
theorem none_orElse' (x : Option α) : none.orElse (fun _ ↦ x) = x := by cases x <;> rfl
@[simp]
theorem orElse_none' (x : Option α) : x.orElse (fun _ ↦ none) = x := by cases x <;> rfl
theorem exists_ne_none {p : Option α → Prop} : (∃ x ≠ none, p x) ↔ (∃ x : α, p x) := by
simp only [← exists_prop, bex_ne_none]
theorem iget_mem [Inhabited α] : ∀ {o : Option α}, isSome o → o.iget ∈ o
| some _, _ => rfl
theorem iget_of_mem [Inhabited α] {a : α} : ∀ {o : Option α}, a ∈ o → o.iget = a
| _, rfl => rfl
theorem getD_default_eq_iget [Inhabited α] (o : Option α) :
o.getD default = o.iget := by cases o <;> rfl
@[simp]
theorem guard_eq_some' {p : Prop} [Decidable p] (u) : _root_.guard p = some u ↔ p := by
cases u
by_cases h : p <;> simp [_root_.guard, h]
theorem liftOrGet_choice {f : α → α → α} (h : ∀ a b, f a b = a ∨ f a b = b) :
∀ o₁ o₂, liftOrGet f o₁ o₂ = o₁ ∨ liftOrGet f o₁ o₂ = o₂
| none, none => Or.inl rfl
| some _, none => Or.inl rfl
| none, some _ => Or.inr rfl
| some a, some b => by simpa [liftOrGet] using h a b
/-- Given an element of `a : Option α`, a default element `b : β` and a function `α → β`, apply this
function to `a` if it comes from `α`, and return `b` otherwise. -/
def casesOn' : Option α → β → (α → β) → β
| none, n, _ => n
| some a, _, s => s a
@[simp]
theorem casesOn'_none (x : β) (f : α → β) : casesOn' none x f = x :=
rfl
@[simp]
theorem casesOn'_some (x : β) (f : α → β) (a : α) : casesOn' (some a) x f = f a :=
rfl
@[simp]
theorem casesOn'_coe (x : β) (f : α → β) (a : α) : casesOn' (a : Option α) x f = f a :=
rfl
@[simp]
theorem casesOn'_none_coe (f : Option α → β) (o : Option α) :
casesOn' o (f none) (f ∘ (fun a ↦ ↑a)) = f o := by cases o <;> rfl
lemma casesOn'_eq_elim (b : β) (f : α → β) (a : Option α) :
Option.casesOn' a b f = Option.elim a b f := by cases a <;> rfl
theorem orElse_eq_some (o o' : Option α) (x : α) :
(o <|> o') = some x ↔ o = some x ∨ o = none ∧ o' = some x := by
cases o
· simp only [true_and, false_or, eq_self_iff_true, none_orElse, reduceCtorEq]
· simp only [some_orElse, or_false, false_and, reduceCtorEq]
theorem orElse_eq_some' (o o' : Option α) (x : α) :
o.orElse (fun _ ↦ o') = some x ↔ o = some x ∨ o = none ∧ o' = some x :=
Option.orElse_eq_some o o' x
@[simp]
theorem orElse_eq_none (o o' : Option α) : (o <|> o') = none ↔ o = none ∧ o' = none := by
cases o
· simp only [true_and, none_orElse, eq_self_iff_true]
· simp only [some_orElse, reduceCtorEq, false_and]
@[simp]
theorem orElse_eq_none' (o o' : Option α) : o.orElse (fun _ ↦ o') = none ↔ o = none ∧ o' = none :=
Option.orElse_eq_none o o'
section
theorem choice_eq_none (α : Type*) [IsEmpty α] : choice α = none :=
dif_neg (not_nonempty_iff_imp_false.mpr isEmptyElim)
end
@[simp]
theorem elim_none_some (f : Option α → β) (i : Option α) : i.elim (f none) (f ∘ some) = f i := by
cases i <;> rfl
theorem elim_comp (h : α → β) {f : γ → α} {x : α} {i : Option γ} :
(i.elim (h x) fun j => h (f j)) = h (i.elim x f) := by cases i <;> rfl
theorem elim_comp₂ (h : α → β → γ) {f : γ → α} {x : α} {g : γ → β} {y : β}
{i : Option γ} : (i.elim (h x y) fun j => h (f j) (g j)) = h (i.elim x f) (i.elim y g) := by
cases i <;> rfl
theorem elim_apply {f : γ → α → β} {x : α → β} {i : Option γ} {y : α} :
i.elim x f y = i.elim (x y) fun j => f j y := by rw [elim_comp fun f : α → β => f y]
@[simp]
lemma bnot_isSome (a : Option α) : (! a.isSome) = a.isNone := by
cases a <;> simp
@[simp]
lemma bnot_comp_isSome : (! ·) ∘ @Option.isSome α = Option.isNone := by
funext
simp
@[simp]
lemma bnot_isNone (a : Option α) : (! a.isNone) = a.isSome := by
cases a <;> simp
@[simp]
lemma bnot_comp_isNone : (! ·) ∘ @Option.isNone α = Option.isSome := by
funext x
simp
@[simp]
lemma isNone_eq_false_iff (a : Option α) : Option.isNone a = false ↔ Option.isSome a := by
cases a <;> simp
lemma eq_none_or_eq_some (a : Option α) : a = none ∨ ∃ x, a = some x :=
Option.exists.mp exists_eq'
lemma eq_none_iff_forall_some_ne {o : Option α} : o = none ↔ ∀ a : α, some a ≠ o := by
apply not_iff_not.1
simpa only [not_forall, not_not] using Option.ne_none_iff_exists
@[deprecated (since := "2025-03-19")] alias forall_some_ne_iff_eq_none := eq_none_iff_forall_some_ne
open Function in
@[simp]
lemma elim'_update {α : Type*} {β : Type*} [DecidableEq α]
(f : β) (g : α → β) (a : α) (x : β) :
Option.elim' f (update g a x) = update (Option.elim' f g) (.some a) x :=
-- Can't reuse `Option.rec_update` as `Option.elim'` is not defeq.
Function.rec_update (α := fun _ => β) (@Option.some.inj _) (Option.elim' f) (fun _ _ => rfl) (fun
| _, _, .some _, h => (h _ rfl).elim
| _, _, .none, _ => rfl) _ _ _
end Option
| Mathlib/Data/Option/Basic.lean | 481 | 483 | |
/-
Copyright (c) 2023 Frédéric Dupuis. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Frédéric Dupuis
-/
import Mathlib.Computability.AkraBazzi.GrowsPolynomially
import Mathlib.Analysis.Calculus.Deriv.Inv
import Mathlib.Analysis.SpecialFunctions.Pow.Deriv
/-!
# Divide-and-conquer recurrences and the Akra-Bazzi theorem
A divide-and-conquer recurrence is a function `T : ℕ → ℝ` that satisfies a recurrence relation of
the form `T(n) = ∑_{i=0}^{k-1} a_i T(r_i(n)) + g(n)` for large enough `n`, where `r_i(n)` is some
function where `‖r_i(n) - b_i n‖ ∈ o(n / (log n)^2)` for every `i`, the `a_i`'s are some positive
coefficients, and the `b_i`'s are reals `∈ (0,1)`. (Note that this can be improved to
`O(n / (log n)^(1+ε))`, this is left as future work.) These recurrences arise mainly in the
analysis of divide-and-conquer algorithms such as mergesort or Strassen's algorithm for matrix
multiplication. This class of algorithms works by dividing an instance of the problem of size `n`,
into `k` smaller instances, where the `i`'th instance is of size roughly `b_i n`, and calling itself
recursively on those smaller instances. `T(n)` then represents the running time of the algorithm,
and `g(n)` represents the running time required to actually divide up the instance and process the
answers that come out of the recursive calls. Since virtually all such algorithms produce instances
that are only approximately of size `b_i n` (they have to round up or down at the very least), we
allow the instance sizes to be given by some function `r_i(n)` that approximates `b_i n`.
The Akra-Bazzi theorem gives the asymptotic order of such a recurrence: it states that
`T(n) ∈ Θ(n^p (1 + ∑_{u=0}^{n-1} g(n) / u^{p+1}))`,
where `p` is the unique real number such that `∑ a_i b_i^p = 1`.
## Main definitions and results
* `AkraBazziRecurrence T g a b r`: the predicate stating that `T : ℕ → ℝ` satisfies an Akra-Bazzi
recurrence with parameters `g`, `a`, `b` and `r` as above.
* `GrowsPolynomially`: The growth condition that `g` must satisfy for the theorem to apply.
It roughly states that
`c₁ g(n) ≤ g(u) ≤ c₂ g(n)`, for u between b*n and n for any constant `b ∈ (0,1)`.
* `sumTransform`: The transformation which turns a function `g` into
`n^p * ∑ u ∈ Finset.Ico n₀ n, g u / u^(p+1)`.
* `asympBound`: The asymptotic bound satisfied by an Akra-Bazzi recurrence, namely
`n^p (1 + ∑ g(u) / u^(p+1))`
* `isTheta_asympBound`: The main result stating that
`T(n) ∈ Θ(n^p (1 + ∑_{u=0}^{n-1} g(n) / u^{p+1}))`
## Implementation
Note that the original version of the theorem has an integral rather than a sum in the above
expression, and first considers the `T : ℝ → ℝ` case before moving on to `ℕ → ℝ`. We prove the
above version with a sum, as it is simpler and more relevant for algorithms.
## TODO
* Specialize this theorem to the very common case where the recurrence is of the form
`T(n) = ℓT(r_i(n)) + g(n)`
where `g(n) ∈ Θ(n^t)` for some `t`. (This is often called the "master theorem" in the literature.)
* Add the original version of the theorem with an integral instead of a sum.
## References
* Mohamad Akra and Louay Bazzi, On the solution of linear recurrence equations
* Tom Leighton, Notes on better master theorems for divide-and-conquer recurrences
* Manuel Eberl, Asymptotic reasoning in a proof assistant
-/
open Finset Real Filter Asymptotics
open scoped Topology
/-!
#### Definition of Akra-Bazzi recurrences
This section defines the predicate `AkraBazziRecurrence T g a b r` which states that `T`
satisfies the recurrence
`T(n) = ∑_{i=0}^{k-1} a_i T(r_i(n)) + g(n)`
with appropriate conditions on the various parameters.
-/
/-- An Akra-Bazzi recurrence is a function that satisfies the recurrence
`T n = (∑ i, a i * T (r i n)) + g n`. -/
structure AkraBazziRecurrence {α : Type*} [Fintype α] [Nonempty α]
(T : ℕ → ℝ) (g : ℝ → ℝ) (a : α → ℝ) (b : α → ℝ) (r : α → ℕ → ℕ) where
/-- Point below which the recurrence is in the base case -/
n₀ : ℕ
/-- `n₀` is always `> 0` -/
n₀_gt_zero : 0 < n₀
/-- The `a`'s are nonzero -/
a_pos : ∀ i, 0 < a i
/-- The `b`'s are nonzero -/
b_pos : ∀ i, 0 < b i
/-- The b's are less than 1 -/
b_lt_one : ∀ i, b i < 1
/-- `g` is nonnegative -/
g_nonneg : ∀ x ≥ 0, 0 ≤ g x
/-- `g` grows polynomially -/
g_grows_poly : AkraBazziRecurrence.GrowsPolynomially g
/-- The actual recurrence -/
h_rec (n : ℕ) (hn₀ : n₀ ≤ n) : T n = (∑ i, a i * T (r i n)) + g n
/-- Base case: `T(n) > 0` whenever `n < n₀` -/
T_gt_zero' (n : ℕ) (hn : n < n₀) : 0 < T n
/-- The `r`'s always reduce `n` -/
r_lt_n : ∀ i n, n₀ ≤ n → r i n < n
/-- The `r`'s approximate the `b`'s -/
dist_r_b : ∀ i, (fun n => (r i n : ℝ) - b i * n) =o[atTop] fun n => n / (log n) ^ 2
namespace AkraBazziRecurrence
section min_max
variable {α : Type*} [Finite α] [Nonempty α]
/-- Smallest `b i` -/
noncomputable def min_bi (b : α → ℝ) : α :=
Classical.choose <| Finite.exists_min b
/-- Largest `b i` -/
noncomputable def max_bi (b : α → ℝ) : α :=
Classical.choose <| Finite.exists_max b
@[aesop safe apply]
lemma min_bi_le {b : α → ℝ} (i : α) : b (min_bi b) ≤ b i :=
Classical.choose_spec (Finite.exists_min b) i
@[aesop safe apply]
lemma max_bi_le {b : α → ℝ} (i : α) : b i ≤ b (max_bi b) :=
Classical.choose_spec (Finite.exists_max b) i
end min_max
lemma isLittleO_self_div_log_id :
(fun (n : ℕ) => n / log n ^ 2) =o[atTop] (fun (n : ℕ) => (n : ℝ)) := by
calc (fun (n : ℕ) => (n : ℝ) / log n ^ 2) = fun (n : ℕ) => (n : ℝ) * ((log n) ^ 2)⁻¹ := by
simp_rw [div_eq_mul_inv]
_ =o[atTop] fun (n : ℕ) => (n : ℝ) * 1⁻¹ := by
refine IsBigO.mul_isLittleO (isBigO_refl _ _) ?_
refine IsLittleO.inv_rev ?main ?zero
case zero => simp
case main => calc
_ = (fun (_ : ℕ) => ((1 : ℝ) ^ 2)) := by simp
_ =o[atTop] (fun (n : ℕ) => (log n)^2) :=
IsLittleO.pow (IsLittleO.natCast_atTop
<| isLittleO_const_log_atTop) (by norm_num)
_ = (fun (n : ℕ) => (n : ℝ)) := by ext; simp
variable {α : Type*} [Fintype α] {T : ℕ → ℝ} {g : ℝ → ℝ} {a b : α → ℝ} {r : α → ℕ → ℕ}
variable [Nonempty α] (R : AkraBazziRecurrence T g a b r)
section
include R
lemma dist_r_b' : ∀ᶠ n in atTop, ∀ i, ‖(r i n : ℝ) - b i * n‖ ≤ n / log n ^ 2 := by
rw [Filter.eventually_all]
intro i
simpa using IsLittleO.eventuallyLE (R.dist_r_b i)
lemma eventually_b_le_r : ∀ᶠ (n : ℕ) in atTop, ∀ i, (b i : ℝ) * n - (n / log n ^ 2) ≤ r i n := by
filter_upwards [R.dist_r_b'] with n hn
intro i
have h₁ : 0 ≤ b i := le_of_lt <| R.b_pos _
rw [sub_le_iff_le_add, add_comm, ← sub_le_iff_le_add]
calc (b i : ℝ) * n - r i n = ‖b i * n‖ - ‖(r i n : ℝ)‖ := by
simp only [norm_mul, RCLike.norm_natCast, sub_left_inj,
Nat.cast_eq_zero, Real.norm_of_nonneg h₁]
_ ≤ ‖(b i * n : ℝ) - r i n‖ := norm_sub_norm_le _ _
_ = ‖(r i n : ℝ) - b i * n‖ := norm_sub_rev _ _
_ ≤ n / log n ^ 2 := hn i
lemma eventually_r_le_b : ∀ᶠ (n : ℕ) in atTop, ∀ i, r i n ≤ (b i : ℝ) * n + (n / log n ^ 2) := by
filter_upwards [R.dist_r_b'] with n hn
intro i
calc r i n = b i * n + (r i n - b i * n) := by ring
_ ≤ b i * n + ‖r i n - b i * n‖ := by gcongr; exact Real.le_norm_self _
_ ≤ b i * n + n / log n ^ 2 := by gcongr; exact hn i
lemma eventually_r_lt_n : ∀ᶠ (n : ℕ) in atTop, ∀ i, r i n < n := by
filter_upwards [eventually_ge_atTop R.n₀] with n hn
exact fun i => R.r_lt_n i n hn
lemma eventually_bi_mul_le_r : ∀ᶠ (n : ℕ) in atTop, ∀ i, (b (min_bi b) / 2) * n ≤ r i n := by
have gt_zero : 0 < b (min_bi b) := R.b_pos (min_bi b)
have hlo := isLittleO_self_div_log_id
rw [Asymptotics.isLittleO_iff] at hlo
have hlo' := hlo (by positivity : 0 < b (min_bi b) / 2)
filter_upwards [hlo', R.eventually_b_le_r] with n hn hn'
intro i
simp only [Real.norm_of_nonneg (by positivity : 0 ≤ (n : ℝ))] at hn
calc b (min_bi b) / 2 * n = b (min_bi b) * n - b (min_bi b) / 2 * n := by ring
_ ≤ b (min_bi b) * n - ‖n / log n ^ 2‖ := by gcongr
_ ≤ b i * n - ‖n / log n ^ 2‖ := by gcongr; aesop
_ = b i * n - n / log n ^ 2 := by
congr
exact Real.norm_of_nonneg <| by positivity
_ ≤ r i n := hn' i
lemma bi_min_div_two_lt_one : b (min_bi b) / 2 < 1 := by
have gt_zero : 0 < b (min_bi b) := R.b_pos (min_bi b)
calc b (min_bi b) / 2 < b (min_bi b) := by aesop (add safe apply div_two_lt_of_pos)
_ < 1 := R.b_lt_one _
lemma bi_min_div_two_pos : 0 < b (min_bi b) / 2 := div_pos (R.b_pos _) (by norm_num)
lemma exists_eventually_const_mul_le_r :
∃ c ∈ Set.Ioo (0 : ℝ) 1, ∀ᶠ (n : ℕ) in atTop, ∀ i, c * n ≤ r i n := by
have gt_zero : 0 < b (min_bi b) := R.b_pos (min_bi b)
exact ⟨b (min_bi b) / 2, ⟨⟨by positivity, R.bi_min_div_two_lt_one⟩, R.eventually_bi_mul_le_r⟩⟩
lemma eventually_r_ge (C : ℝ) : ∀ᶠ (n : ℕ) in atTop, ∀ i, C ≤ r i n := by
obtain ⟨c, hc_mem, hc⟩ := R.exists_eventually_const_mul_le_r
filter_upwards [eventually_ge_atTop ⌈C / c⌉₊, hc] with n hn₁ hn₂
have h₁ := hc_mem.1
intro i
calc C = c * (C / c) := by
rw [← mul_div_assoc]
exact (mul_div_cancel_left₀ _ (by positivity)).symm
_ ≤ c * ⌈C / c⌉₊ := by gcongr; simp [Nat.le_ceil]
| _ ≤ c * n := by gcongr
_ ≤ r i n := hn₂ i
lemma tendsto_atTop_r (i : α) : Tendsto (r i) atTop atTop := by
rw [tendsto_atTop]
intro b
| Mathlib/Computability/AkraBazzi/AkraBazzi.lean | 215 | 220 |
/-
Copyright (c) 2021 Kexing Ying. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Kexing Ying
-/
import Mathlib.MeasureTheory.Measure.Decomposition.RadonNikodym
import Mathlib.MeasureTheory.Measure.Haar.OfBasis
import Mathlib.Probability.Independence.Basic
/-!
# Probability density function
This file defines the probability density function of random variables, by which we mean
measurable functions taking values in a Borel space. The probability density function is defined
as the Radon–Nikodym derivative of the law of `X`. In particular, a measurable function `f`
is said to the probability density function of a random variable `X` if for all measurable
sets `S`, `ℙ(X ∈ S) = ∫ x in S, f x dx`. Probability density functions are one way of describing
the distribution of a random variable, and are useful for calculating probabilities and
finding moments (although the latter is better achieved with moment generating functions).
This file also defines the continuous uniform distribution and proves some properties about
random variables with this distribution.
## Main definitions
* `MeasureTheory.HasPDF` : A random variable `X : Ω → E` is said to `HasPDF` with
respect to the measure `ℙ` on `Ω` and `μ` on `E` if the push-forward measure of `ℙ` along `X`
is absolutely continuous with respect to `μ` and they `HaveLebesgueDecomposition`.
* `MeasureTheory.pdf` : If `X` is a random variable that `HasPDF X ℙ μ`, then `pdf X`
is the Radon–Nikodym derivative of the push-forward measure of `ℙ` along `X` with respect to `μ`.
* `MeasureTheory.pdf.IsUniform` : A random variable `X` is said to follow the uniform
distribution if it has a constant probability density function with a compact, non-null support.
## Main results
* `MeasureTheory.pdf.integral_pdf_smul` : Law of the unconscious statistician,
i.e. if a random variable `X : Ω → E` has pdf `f`, then `𝔼(g(X)) = ∫ x, f x • g x dx` for
all measurable `g : E → F`.
* `MeasureTheory.pdf.integral_mul_eq_integral` : A real-valued random variable `X` with
pdf `f` has expectation `∫ x, x * f x dx`.
* `MeasureTheory.pdf.IsUniform.integral_eq` : If `X` follows the uniform distribution with
its pdf having support `s`, then `X` has expectation `(λ s)⁻¹ * ∫ x in s, x dx` where `λ`
is the Lebesgue measure.
## TODO
Ultimately, we would also like to define characteristic functions to describe distributions as
it exists for all random variables. However, to define this, we will need Fourier transforms
which we currently do not have.
-/
open scoped MeasureTheory NNReal ENNReal
open TopologicalSpace MeasureTheory.Measure
noncomputable section
namespace MeasureTheory
variable {Ω E : Type*} [MeasurableSpace E]
/-- A random variable `X : Ω → E` is said to have a probability density function (`HasPDF`)
with respect to the measure `ℙ` on `Ω` and `μ` on `E`
if the push-forward measure of `ℙ` along `X` is absolutely continuous with respect to `μ`
and they have a Lebesgue decomposition (`HaveLebesgueDecomposition`). -/
class HasPDF {m : MeasurableSpace Ω} (X : Ω → E) (ℙ : Measure Ω) (μ : Measure E := by volume_tac) :
Prop where
protected aemeasurable' : AEMeasurable X ℙ
protected haveLebesgueDecomposition' : (map X ℙ).HaveLebesgueDecomposition μ
protected absolutelyContinuous' : map X ℙ ≪ μ
section HasPDF
variable {_ : MeasurableSpace Ω} {X Y : Ω → E} {ℙ : Measure Ω} {μ : Measure E}
theorem hasPDF_iff :
HasPDF X ℙ μ ↔ AEMeasurable X ℙ ∧ (map X ℙ).HaveLebesgueDecomposition μ ∧ map X ℙ ≪ μ :=
⟨fun ⟨h₁, h₂, h₃⟩ ↦ ⟨h₁, h₂, h₃⟩, fun ⟨h₁, h₂, h₃⟩ ↦ ⟨h₁, h₂, h₃⟩⟩
theorem hasPDF_iff_of_aemeasurable (hX : AEMeasurable X ℙ) :
HasPDF X ℙ μ ↔ (map X ℙ).HaveLebesgueDecomposition μ ∧ map X ℙ ≪ μ := by
rw [hasPDF_iff]
simp only [hX, true_and]
variable (X ℙ μ) in
@[measurability]
theorem HasPDF.aemeasurable [HasPDF X ℙ μ] : AEMeasurable X ℙ := HasPDF.aemeasurable' μ
instance HasPDF.haveLebesgueDecomposition [HasPDF X ℙ μ] : (map X ℙ).HaveLebesgueDecomposition μ :=
HasPDF.haveLebesgueDecomposition'
theorem HasPDF.absolutelyContinuous [HasPDF X ℙ μ] : map X ℙ ≪ μ := HasPDF.absolutelyContinuous'
/-- A random variable that `HasPDF` is quasi-measure preserving. -/
theorem HasPDF.quasiMeasurePreserving_of_measurable (X : Ω → E) (ℙ : Measure Ω) (μ : Measure E)
[HasPDF X ℙ μ] (h : Measurable X) : QuasiMeasurePreserving X ℙ μ :=
{ measurable := h
absolutelyContinuous := HasPDF.absolutelyContinuous .. }
theorem HasPDF.congr (hXY : X =ᵐ[ℙ] Y) [hX : HasPDF X ℙ μ] : HasPDF Y ℙ μ :=
⟨(HasPDF.aemeasurable X ℙ μ).congr hXY, ℙ.map_congr hXY ▸ hX.haveLebesgueDecomposition,
ℙ.map_congr hXY ▸ hX.absolutelyContinuous⟩
theorem HasPDF.congr_iff (hXY : X =ᵐ[ℙ] Y) : HasPDF X ℙ μ ↔ HasPDF Y ℙ μ :=
⟨fun _ ↦ HasPDF.congr hXY, fun _ ↦ HasPDF.congr hXY.symm⟩
@[deprecated (since := "2024-10-28")] alias HasPDF.congr' := HasPDF.congr_iff
/-- X `HasPDF` if there is a pdf `f` such that `map X ℙ = μ.withDensity f`. -/
theorem hasPDF_of_map_eq_withDensity (hX : AEMeasurable X ℙ) (f : E → ℝ≥0∞) (hf : AEMeasurable f μ)
(h : map X ℙ = μ.withDensity f) : HasPDF X ℙ μ := by
refine ⟨hX, ?_, ?_⟩ <;> rw [h]
· rw [withDensity_congr_ae hf.ae_eq_mk]
exact haveLebesgueDecomposition_withDensity μ hf.measurable_mk
· exact withDensity_absolutelyContinuous μ f
end HasPDF
/-- If `X` is a random variable, then `pdf X ℙ μ`
is the Radon–Nikodym derivative of the push-forward measure of `ℙ` along `X` with respect to `μ`. -/
def pdf {_ : MeasurableSpace Ω} (X : Ω → E) (ℙ : Measure Ω) (μ : Measure E := by volume_tac) :
E → ℝ≥0∞ :=
(map X ℙ).rnDeriv μ
theorem pdf_def {_ : MeasurableSpace Ω} {ℙ : Measure Ω} {μ : Measure E} {X : Ω → E} :
pdf X ℙ μ = (map X ℙ).rnDeriv μ := rfl
theorem pdf_of_not_aemeasurable {_ : MeasurableSpace Ω} {ℙ : Measure Ω} {μ : Measure E}
{X : Ω → E} (hX : ¬AEMeasurable X ℙ) : pdf X ℙ μ =ᵐ[μ] 0 := by
rw [pdf_def, map_of_not_aemeasurable hX]
exact rnDeriv_zero μ
theorem pdf_of_not_haveLebesgueDecomposition {_ : MeasurableSpace Ω} {ℙ : Measure Ω}
{μ : Measure E} {X : Ω → E} (h : ¬(map X ℙ).HaveLebesgueDecomposition μ) : pdf X ℙ μ = 0 :=
rnDeriv_of_not_haveLebesgueDecomposition h
theorem aemeasurable_of_pdf_ne_zero {m : MeasurableSpace Ω} {ℙ : Measure Ω} {μ : Measure E}
(X : Ω → E) (h : ¬pdf X ℙ μ =ᵐ[μ] 0) : AEMeasurable X ℙ := by
contrapose! h
exact pdf_of_not_aemeasurable h
theorem hasPDF_of_pdf_ne_zero {m : MeasurableSpace Ω} {ℙ : Measure Ω} {μ : Measure E} {X : Ω → E}
(hac : map X ℙ ≪ μ) (hpdf : ¬pdf X ℙ μ =ᵐ[μ] 0) : HasPDF X ℙ μ := by
refine ⟨?_, ?_, hac⟩
· exact aemeasurable_of_pdf_ne_zero X hpdf
· contrapose! hpdf
have := pdf_of_not_haveLebesgueDecomposition hpdf
filter_upwards using congrFun this
@[measurability]
theorem measurable_pdf {m : MeasurableSpace Ω} (X : Ω → E) (ℙ : Measure Ω)
(μ : Measure E := by volume_tac) : Measurable (pdf X ℙ μ) := by
exact measurable_rnDeriv _ _
theorem withDensity_pdf_le_map {_ : MeasurableSpace Ω} (X : Ω → E) (ℙ : Measure Ω)
(μ : Measure E := by volume_tac) : μ.withDensity (pdf X ℙ μ) ≤ map X ℙ :=
withDensity_rnDeriv_le _ _
theorem setLIntegral_pdf_le_map {m : MeasurableSpace Ω} (X : Ω → E) (ℙ : Measure Ω)
(μ : Measure E := by volume_tac) (s : Set E) :
∫⁻ x in s, pdf X ℙ μ x ∂μ ≤ map X ℙ s := by
apply (withDensity_apply_le _ s).trans
exact withDensity_pdf_le_map _ _ _ s
theorem map_eq_withDensity_pdf {m : MeasurableSpace Ω} (X : Ω → E) (ℙ : Measure Ω)
(μ : Measure E := by volume_tac) [hX : HasPDF X ℙ μ] :
map X ℙ = μ.withDensity (pdf X ℙ μ) := by
rw [pdf_def, withDensity_rnDeriv_eq _ _ hX.absolutelyContinuous]
theorem map_eq_setLIntegral_pdf {m : MeasurableSpace Ω} (X : Ω → E) (ℙ : Measure Ω)
(μ : Measure E := by volume_tac) [hX : HasPDF X ℙ μ] {s : Set E}
(hs : MeasurableSet s) : map X ℙ s = ∫⁻ x in s, pdf X ℙ μ x ∂μ := by
rw [← withDensity_apply _ hs, map_eq_withDensity_pdf X ℙ μ]
namespace pdf
variable {m : MeasurableSpace Ω} {ℙ : Measure Ω} {μ : Measure E}
protected theorem congr {X Y : Ω → E} (hXY : X =ᵐ[ℙ] Y) : pdf X ℙ μ = pdf Y ℙ μ := by
rw [pdf_def, pdf_def, map_congr hXY]
theorem lintegral_eq_measure_univ {X : Ω → E} [HasPDF X ℙ μ] :
∫⁻ x, pdf X ℙ μ x ∂μ = ℙ Set.univ := by
rw [← setLIntegral_univ, ← map_eq_setLIntegral_pdf X ℙ μ MeasurableSet.univ,
map_apply_of_aemeasurable (HasPDF.aemeasurable X ℙ μ) MeasurableSet.univ, Set.preimage_univ]
theorem eq_of_map_eq_withDensity [IsFiniteMeasure ℙ] {X : Ω → E} [HasPDF X ℙ μ] (f : E → ℝ≥0∞)
(hmf : AEMeasurable f μ) : map X ℙ = μ.withDensity f ↔ pdf X ℙ μ =ᵐ[μ] f := by
rw [map_eq_withDensity_pdf X ℙ μ]
apply withDensity_eq_iff (measurable_pdf X ℙ μ).aemeasurable hmf
rw [lintegral_eq_measure_univ]
exact measure_ne_top _ _
theorem eq_of_map_eq_withDensity' [SigmaFinite μ] {X : Ω → E} [HasPDF X ℙ μ] (f : E → ℝ≥0∞)
(hmf : AEMeasurable f μ) : map X ℙ = μ.withDensity f ↔ pdf X ℙ μ =ᵐ[μ] f :=
map_eq_withDensity_pdf X ℙ μ ▸
withDensity_eq_iff_of_sigmaFinite (measurable_pdf X ℙ μ).aemeasurable hmf
nonrec theorem ae_lt_top [IsFiniteMeasure ℙ] {μ : Measure E} {X : Ω → E} :
∀ᵐ x ∂μ, pdf X ℙ μ x < ∞ :=
rnDeriv_lt_top (map X ℙ) μ
nonrec theorem ofReal_toReal_ae_eq [IsFiniteMeasure ℙ] {X : Ω → E} :
(fun x => ENNReal.ofReal (pdf X ℙ μ x).toReal) =ᵐ[μ] pdf X ℙ μ :=
ofReal_toReal_ae_eq ae_lt_top
| section IntegralPDFMul
/-- **The Law of the Unconscious Statistician** for nonnegative random variables. -/
theorem lintegral_pdf_mul {X : Ω → E} [HasPDF X ℙ μ] {f : E → ℝ≥0∞}
| Mathlib/Probability/Density.lean | 208 | 211 |
/-
Copyright (c) 2018 Patrick Massot. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Patrick Massot, Johannes Hölzl, Yaël Dillies
-/
import Mathlib.Analysis.Normed.Group.Seminorm
import Mathlib.Data.NNReal.Basic
import Mathlib.Topology.Algebra.Support
import Mathlib.Topology.MetricSpace.Basic
import Mathlib.Topology.Order.Real
/-!
# Normed (semi)groups
In this file we define 10 classes:
* `Norm`, `NNNorm`: auxiliary classes endowing a type `α` with a function `norm : α → ℝ`
(notation: `‖x‖`) and `nnnorm : α → ℝ≥0` (notation: `‖x‖₊`), respectively;
* `Seminormed...Group`: A seminormed (additive) (commutative) group is an (additive) (commutative)
group with a norm and a compatible pseudometric space structure:
`∀ x y, dist x y = ‖x / y‖` or `∀ x y, dist x y = ‖x - y‖`, depending on the group operation.
* `Normed...Group`: A normed (additive) (commutative) group is an (additive) (commutative) group
with a norm and a compatible metric space structure.
We also prove basic properties of (semi)normed groups and provide some instances.
## Notes
The current convention `dist x y = ‖x - y‖` means that the distance is invariant under right
addition, but actions in mathlib are usually from the left. This means we might want to change it to
`dist x y = ‖-x + y‖`.
The normed group hierarchy would lend itself well to a mixin design (that is, having
`SeminormedGroup` and `SeminormedAddGroup` not extend `Group` and `AddGroup`), but we choose not
to for performance concerns.
## Tags
normed group
-/
variable {𝓕 α ι κ E F G : Type*}
open Filter Function Metric Bornology
open ENNReal Filter NNReal Uniformity Pointwise Topology
/-- Auxiliary class, endowing a type `E` with a function `norm : E → ℝ` with notation `‖x‖`. This
class is designed to be extended in more interesting classes specifying the properties of the norm.
-/
@[notation_class]
class Norm (E : Type*) where
/-- the `ℝ`-valued norm function. -/
norm : E → ℝ
/-- Auxiliary class, endowing a type `α` with a function `nnnorm : α → ℝ≥0` with notation `‖x‖₊`. -/
@[notation_class]
class NNNorm (E : Type*) where
/-- the `ℝ≥0`-valued norm function. -/
nnnorm : E → ℝ≥0
/-- Auxiliary class, endowing a type `α` with a function `enorm : α → ℝ≥0∞` with notation `‖x‖ₑ`. -/
@[notation_class]
class ENorm (E : Type*) where
/-- the `ℝ≥0∞`-valued norm function. -/
enorm : E → ℝ≥0∞
export Norm (norm)
export NNNorm (nnnorm)
export ENorm (enorm)
@[inherit_doc] notation "‖" e "‖" => norm e
@[inherit_doc] notation "‖" e "‖₊" => nnnorm e
@[inherit_doc] notation "‖" e "‖ₑ" => enorm e
section ENorm
variable {E : Type*} [NNNorm E] {x : E} {r : ℝ≥0}
instance NNNorm.toENorm : ENorm E where enorm := (‖·‖₊ : E → ℝ≥0∞)
lemma enorm_eq_nnnorm (x : E) : ‖x‖ₑ = ‖x‖₊ := rfl
@[simp] lemma toNNReal_enorm (x : E) : ‖x‖ₑ.toNNReal = ‖x‖₊ := rfl
@[simp, norm_cast] lemma coe_le_enorm : r ≤ ‖x‖ₑ ↔ r ≤ ‖x‖₊ := by simp [enorm]
@[simp, norm_cast] lemma enorm_le_coe : ‖x‖ₑ ≤ r ↔ ‖x‖₊ ≤ r := by simp [enorm]
@[simp, norm_cast] lemma coe_lt_enorm : r < ‖x‖ₑ ↔ r < ‖x‖₊ := by simp [enorm]
@[simp, norm_cast] lemma enorm_lt_coe : ‖x‖ₑ < r ↔ ‖x‖₊ < r := by simp [enorm]
@[simp] lemma enorm_ne_top : ‖x‖ₑ ≠ ∞ := by simp [enorm]
@[simp] lemma enorm_lt_top : ‖x‖ₑ < ∞ := by simp [enorm]
end ENorm
/-- A type `E` equipped with a continuous map `‖·‖ₑ : E → ℝ≥0∞`
NB. We do not demand that the topology is somehow defined by the enorm:
for ℝ≥0∞ (the motivating example behind this definition), this is not true. -/
class ContinuousENorm (E : Type*) [TopologicalSpace E] extends ENorm E where
continuous_enorm : Continuous enorm
/-- An enormed monoid is an additive monoid endowed with a continuous enorm. -/
class ENormedAddMonoid (E : Type*) [TopologicalSpace E] extends ContinuousENorm E, AddMonoid E where
enorm_eq_zero : ∀ x : E, ‖x‖ₑ = 0 ↔ x = 0
protected enorm_add_le : ∀ x y : E, ‖x + y‖ₑ ≤ ‖x‖ₑ + ‖y‖ₑ
/-- An enormed monoid is a monoid endowed with a continuous enorm. -/
@[to_additive]
class ENormedMonoid (E : Type*) [TopologicalSpace E] extends ContinuousENorm E, Monoid E where
enorm_eq_zero : ∀ x : E, ‖x‖ₑ = 0 ↔ x = 1
enorm_mul_le : ∀ x y : E, ‖x * y‖ₑ ≤ ‖x‖ₑ + ‖y‖ₑ
/-- An enormed commutative monoid is an additive commutative monoid
endowed with a continuous enorm.
We don't have `ENormedAddCommMonoid` extend `EMetricSpace`, since the canonical instance `ℝ≥0∞`
is not an `EMetricSpace`. This is because `ℝ≥0∞` carries the order topology, which is distinct from
the topology coming from `edist`. -/
class ENormedAddCommMonoid (E : Type*) [TopologicalSpace E]
extends ENormedAddMonoid E, AddCommMonoid E where
/-- An enormed commutative monoid is a commutative monoid endowed with a continuous enorm. -/
@[to_additive]
class ENormedCommMonoid (E : Type*) [TopologicalSpace E] extends ENormedMonoid E, CommMonoid E where
/-- A seminormed group is an additive group endowed with a norm for which `dist x y = ‖x - y‖`
defines a pseudometric space structure. -/
class SeminormedAddGroup (E : Type*) extends Norm E, AddGroup E, PseudoMetricSpace E where
dist := fun x y => ‖x - y‖
/-- The distance function is induced by the norm. -/
dist_eq : ∀ x y, dist x y = ‖x - y‖ := by aesop
/-- A seminormed group is a group endowed with a norm for which `dist x y = ‖x / y‖` defines a
pseudometric space structure. -/
@[to_additive]
class SeminormedGroup (E : Type*) extends Norm E, Group E, PseudoMetricSpace E where
dist := fun x y => ‖x / y‖
/-- The distance function is induced by the norm. -/
dist_eq : ∀ x y, dist x y = ‖x / y‖ := by aesop
/-- A normed group is an additive group endowed with a norm for which `dist x y = ‖x - y‖` defines a
metric space structure. -/
class NormedAddGroup (E : Type*) extends Norm E, AddGroup E, MetricSpace E where
dist := fun x y => ‖x - y‖
/-- The distance function is induced by the norm. -/
dist_eq : ∀ x y, dist x y = ‖x - y‖ := by aesop
/-- A normed group is a group endowed with a norm for which `dist x y = ‖x / y‖` defines a metric
space structure. -/
@[to_additive]
class NormedGroup (E : Type*) extends Norm E, Group E, MetricSpace E where
dist := fun x y => ‖x / y‖
/-- The distance function is induced by the norm. -/
dist_eq : ∀ x y, dist x y = ‖x / y‖ := by aesop
/-- A seminormed group is an additive group endowed with a norm for which `dist x y = ‖x - y‖`
defines a pseudometric space structure. -/
class SeminormedAddCommGroup (E : Type*) extends Norm E, AddCommGroup E,
PseudoMetricSpace E where
dist := fun x y => ‖x - y‖
/-- The distance function is induced by the norm. -/
dist_eq : ∀ x y, dist x y = ‖x - y‖ := by aesop
/-- A seminormed group is a group endowed with a norm for which `dist x y = ‖x / y‖`
defines a pseudometric space structure. -/
@[to_additive]
class SeminormedCommGroup (E : Type*) extends Norm E, CommGroup E, PseudoMetricSpace E where
dist := fun x y => ‖x / y‖
/-- The distance function is induced by the norm. -/
dist_eq : ∀ x y, dist x y = ‖x / y‖ := by aesop
/-- A normed group is an additive group endowed with a norm for which `dist x y = ‖x - y‖` defines a
metric space structure. -/
class NormedAddCommGroup (E : Type*) extends Norm E, AddCommGroup E, MetricSpace E where
dist := fun x y => ‖x - y‖
/-- The distance function is induced by the norm. -/
dist_eq : ∀ x y, dist x y = ‖x - y‖ := by aesop
/-- A normed group is a group endowed with a norm for which `dist x y = ‖x / y‖` defines a metric
space structure. -/
@[to_additive]
class NormedCommGroup (E : Type*) extends Norm E, CommGroup E, MetricSpace E where
dist := fun x y => ‖x / y‖
/-- The distance function is induced by the norm. -/
dist_eq : ∀ x y, dist x y = ‖x / y‖ := by aesop
-- See note [lower instance priority]
@[to_additive]
instance (priority := 100) NormedGroup.toSeminormedGroup [NormedGroup E] : SeminormedGroup E :=
{ ‹NormedGroup E› with }
-- See note [lower instance priority]
@[to_additive]
instance (priority := 100) NormedCommGroup.toSeminormedCommGroup [NormedCommGroup E] :
SeminormedCommGroup E :=
{ ‹NormedCommGroup E› with }
-- See note [lower instance priority]
@[to_additive]
instance (priority := 100) SeminormedCommGroup.toSeminormedGroup [SeminormedCommGroup E] :
SeminormedGroup E :=
{ ‹SeminormedCommGroup E› with }
-- See note [lower instance priority]
@[to_additive]
instance (priority := 100) NormedCommGroup.toNormedGroup [NormedCommGroup E] : NormedGroup E :=
{ ‹NormedCommGroup E› with }
-- See note [reducible non-instances]
/-- Construct a `NormedGroup` from a `SeminormedGroup` satisfying `∀ x, ‖x‖ = 0 → x = 1`. This
avoids having to go back to the `(Pseudo)MetricSpace` level when declaring a `NormedGroup`
instance as a special case of a more general `SeminormedGroup` instance. -/
@[to_additive "Construct a `NormedAddGroup` from a `SeminormedAddGroup`
satisfying `∀ x, ‖x‖ = 0 → x = 0`. This avoids having to go back to the `(Pseudo)MetricSpace`
level when declaring a `NormedAddGroup` instance as a special case of a more general
`SeminormedAddGroup` instance."]
abbrev NormedGroup.ofSeparation [SeminormedGroup E] (h : ∀ x : E, ‖x‖ = 0 → x = 1) :
NormedGroup E where
dist_eq := ‹SeminormedGroup E›.dist_eq
toMetricSpace :=
{ eq_of_dist_eq_zero := fun hxy =>
div_eq_one.1 <| h _ <| (‹SeminormedGroup E›.dist_eq _ _).symm.trans hxy }
-- See note [reducible non-instances]
/-- Construct a `NormedCommGroup` from a `SeminormedCommGroup` satisfying
`∀ x, ‖x‖ = 0 → x = 1`. This avoids having to go back to the `(Pseudo)MetricSpace` level when
declaring a `NormedCommGroup` instance as a special case of a more general `SeminormedCommGroup`
instance. -/
@[to_additive "Construct a `NormedAddCommGroup` from a
`SeminormedAddCommGroup` satisfying `∀ x, ‖x‖ = 0 → x = 0`. This avoids having to go back to the
`(Pseudo)MetricSpace` level when declaring a `NormedAddCommGroup` instance as a special case
of a more general `SeminormedAddCommGroup` instance."]
abbrev NormedCommGroup.ofSeparation [SeminormedCommGroup E] (h : ∀ x : E, ‖x‖ = 0 → x = 1) :
NormedCommGroup E :=
{ ‹SeminormedCommGroup E›, NormedGroup.ofSeparation h with }
-- See note [reducible non-instances]
/-- Construct a seminormed group from a multiplication-invariant distance. -/
@[to_additive
"Construct a seminormed group from a translation-invariant distance."]
abbrev SeminormedGroup.ofMulDist [Norm E] [Group E] [PseudoMetricSpace E]
(h₁ : ∀ x : E, ‖x‖ = dist x 1) (h₂ : ∀ x y z : E, dist x y ≤ dist (x * z) (y * z)) :
SeminormedGroup E where
dist_eq x y := by
rw [h₁]; apply le_antisymm
· simpa only [div_eq_mul_inv, ← mul_inv_cancel y] using h₂ _ _ _
· simpa only [div_mul_cancel, one_mul] using h₂ (x / y) 1 y
-- See note [reducible non-instances]
/-- Construct a seminormed group from a multiplication-invariant pseudodistance. -/
@[to_additive
"Construct a seminormed group from a translation-invariant pseudodistance."]
abbrev SeminormedGroup.ofMulDist' [Norm E] [Group E] [PseudoMetricSpace E]
(h₁ : ∀ x : E, ‖x‖ = dist x 1) (h₂ : ∀ x y z : E, dist (x * z) (y * z) ≤ dist x y) :
SeminormedGroup E where
dist_eq x y := by
rw [h₁]; apply le_antisymm
· simpa only [div_mul_cancel, one_mul] using h₂ (x / y) 1 y
· simpa only [div_eq_mul_inv, ← mul_inv_cancel y] using h₂ _ _ _
-- See note [reducible non-instances]
/-- Construct a seminormed group from a multiplication-invariant pseudodistance. -/
@[to_additive
"Construct a seminormed group from a translation-invariant pseudodistance."]
abbrev SeminormedCommGroup.ofMulDist [Norm E] [CommGroup E] [PseudoMetricSpace E]
(h₁ : ∀ x : E, ‖x‖ = dist x 1) (h₂ : ∀ x y z : E, dist x y ≤ dist (x * z) (y * z)) :
SeminormedCommGroup E :=
{ SeminormedGroup.ofMulDist h₁ h₂ with
mul_comm := mul_comm }
-- See note [reducible non-instances]
/-- Construct a seminormed group from a multiplication-invariant pseudodistance. -/
@[to_additive
"Construct a seminormed group from a translation-invariant pseudodistance."]
abbrev SeminormedCommGroup.ofMulDist' [Norm E] [CommGroup E] [PseudoMetricSpace E]
(h₁ : ∀ x : E, ‖x‖ = dist x 1) (h₂ : ∀ x y z : E, dist (x * z) (y * z) ≤ dist x y) :
SeminormedCommGroup E :=
{ SeminormedGroup.ofMulDist' h₁ h₂ with
mul_comm := mul_comm }
-- See note [reducible non-instances]
/-- Construct a normed group from a multiplication-invariant distance. -/
@[to_additive
"Construct a normed group from a translation-invariant distance."]
abbrev NormedGroup.ofMulDist [Norm E] [Group E] [MetricSpace E] (h₁ : ∀ x : E, ‖x‖ = dist x 1)
(h₂ : ∀ x y z : E, dist x y ≤ dist (x * z) (y * z)) : NormedGroup E :=
{ SeminormedGroup.ofMulDist h₁ h₂ with
eq_of_dist_eq_zero := eq_of_dist_eq_zero }
-- See note [reducible non-instances]
/-- Construct a normed group from a multiplication-invariant pseudodistance. -/
@[to_additive
"Construct a normed group from a translation-invariant pseudodistance."]
abbrev NormedGroup.ofMulDist' [Norm E] [Group E] [MetricSpace E] (h₁ : ∀ x : E, ‖x‖ = dist x 1)
(h₂ : ∀ x y z : E, dist (x * z) (y * z) ≤ dist x y) : NormedGroup E :=
{ SeminormedGroup.ofMulDist' h₁ h₂ with
eq_of_dist_eq_zero := eq_of_dist_eq_zero }
-- See note [reducible non-instances]
/-- Construct a normed group from a multiplication-invariant pseudodistance. -/
@[to_additive
"Construct a normed group from a translation-invariant pseudodistance."]
abbrev NormedCommGroup.ofMulDist [Norm E] [CommGroup E] [MetricSpace E]
(h₁ : ∀ x : E, ‖x‖ = dist x 1) (h₂ : ∀ x y z : E, dist x y ≤ dist (x * z) (y * z)) :
NormedCommGroup E :=
{ NormedGroup.ofMulDist h₁ h₂ with
mul_comm := mul_comm }
-- See note [reducible non-instances]
/-- Construct a normed group from a multiplication-invariant pseudodistance. -/
@[to_additive
"Construct a normed group from a translation-invariant pseudodistance."]
abbrev NormedCommGroup.ofMulDist' [Norm E] [CommGroup E] [MetricSpace E]
(h₁ : ∀ x : E, ‖x‖ = dist x 1) (h₂ : ∀ x y z : E, dist (x * z) (y * z) ≤ dist x y) :
NormedCommGroup E :=
{ NormedGroup.ofMulDist' h₁ h₂ with
mul_comm := mul_comm }
-- See note [reducible non-instances]
/-- Construct a seminormed group from a seminorm, i.e., registering the pseudodistance and the
pseudometric space structure from the seminorm properties. Note that in most cases this instance
creates bad definitional equalities (e.g., it does not take into account a possibly existing
`UniformSpace` instance on `E`). -/
@[to_additive
"Construct a seminormed group from a seminorm, i.e., registering the pseudodistance
and the pseudometric space structure from the seminorm properties. Note that in most cases this
instance creates bad definitional equalities (e.g., it does not take into account a possibly
existing `UniformSpace` instance on `E`)."]
abbrev GroupSeminorm.toSeminormedGroup [Group E] (f : GroupSeminorm E) : SeminormedGroup E where
dist x y := f (x / y)
norm := f
dist_eq _ _ := rfl
dist_self x := by simp only [div_self', map_one_eq_zero]
dist_triangle := le_map_div_add_map_div f
dist_comm := map_div_rev f
-- See note [reducible non-instances]
/-- Construct a seminormed group from a seminorm, i.e., registering the pseudodistance and the
pseudometric space structure from the seminorm properties. Note that in most cases this instance
creates bad definitional equalities (e.g., it does not take into account a possibly existing
`UniformSpace` instance on `E`). -/
@[to_additive
"Construct a seminormed group from a seminorm, i.e., registering the pseudodistance
and the pseudometric space structure from the seminorm properties. Note that in most cases this
instance creates bad definitional equalities (e.g., it does not take into account a possibly
existing `UniformSpace` instance on `E`)."]
abbrev GroupSeminorm.toSeminormedCommGroup [CommGroup E] (f : GroupSeminorm E) :
SeminormedCommGroup E :=
{ f.toSeminormedGroup with
mul_comm := mul_comm }
-- See note [reducible non-instances]
/-- Construct a normed group from a norm, i.e., registering the distance and the metric space
structure from the norm properties. Note that in most cases this instance creates bad definitional
equalities (e.g., it does not take into account a possibly existing `UniformSpace` instance on
`E`). -/
@[to_additive
"Construct a normed group from a norm, i.e., registering the distance and the metric
space structure from the norm properties. Note that in most cases this instance creates bad
definitional equalities (e.g., it does not take into account a possibly existing `UniformSpace`
instance on `E`)."]
abbrev GroupNorm.toNormedGroup [Group E] (f : GroupNorm E) : NormedGroup E :=
{ f.toGroupSeminorm.toSeminormedGroup with
eq_of_dist_eq_zero := fun h => div_eq_one.1 <| eq_one_of_map_eq_zero f h }
-- See note [reducible non-instances]
/-- Construct a normed group from a norm, i.e., registering the distance and the metric space
structure from the norm properties. Note that in most cases this instance creates bad definitional
equalities (e.g., it does not take into account a possibly existing `UniformSpace` instance on
`E`). -/
@[to_additive
"Construct a normed group from a norm, i.e., registering the distance and the metric
space structure from the norm properties. Note that in most cases this instance creates bad
definitional equalities (e.g., it does not take into account a possibly existing `UniformSpace`
instance on `E`)."]
abbrev GroupNorm.toNormedCommGroup [CommGroup E] (f : GroupNorm E) : NormedCommGroup E :=
{ f.toNormedGroup with
mul_comm := mul_comm }
section SeminormedGroup
variable [SeminormedGroup E] [SeminormedGroup F] [SeminormedGroup G] {s : Set E}
{a a₁ a₂ b c : E} {r r₁ r₂ : ℝ}
@[to_additive]
theorem dist_eq_norm_div (a b : E) : dist a b = ‖a / b‖ :=
SeminormedGroup.dist_eq _ _
@[to_additive]
theorem dist_eq_norm_div' (a b : E) : dist a b = ‖b / a‖ := by rw [dist_comm, dist_eq_norm_div]
alias dist_eq_norm := dist_eq_norm_sub
alias dist_eq_norm' := dist_eq_norm_sub'
@[to_additive of_forall_le_norm]
lemma DiscreteTopology.of_forall_le_norm' (hpos : 0 < r) (hr : ∀ x : E, x ≠ 1 → r ≤ ‖x‖) :
DiscreteTopology E :=
.of_forall_le_dist hpos fun x y hne ↦ by
simp only [dist_eq_norm_div]
exact hr _ (div_ne_one.2 hne)
@[to_additive (attr := simp)]
theorem dist_one_right (a : E) : dist a 1 = ‖a‖ := by rw [dist_eq_norm_div, div_one]
@[to_additive]
theorem inseparable_one_iff_norm {a : E} : Inseparable a 1 ↔ ‖a‖ = 0 := by
rw [Metric.inseparable_iff, dist_one_right]
@[to_additive]
lemma dist_one_left (a : E) : dist 1 a = ‖a‖ := by rw [dist_comm, dist_one_right]
@[to_additive (attr := simp)]
lemma dist_one : dist (1 : E) = norm := funext dist_one_left
@[to_additive]
theorem norm_div_rev (a b : E) : ‖a / b‖ = ‖b / a‖ := by
simpa only [dist_eq_norm_div] using dist_comm a b
@[to_additive (attr := simp) norm_neg]
theorem norm_inv' (a : E) : ‖a⁻¹‖ = ‖a‖ := by simpa using norm_div_rev 1 a
@[to_additive (attr := simp) norm_abs_zsmul]
theorem norm_zpow_abs (a : E) (n : ℤ) : ‖a ^ |n|‖ = ‖a ^ n‖ := by
rcases le_total 0 n with hn | hn <;> simp [hn, abs_of_nonneg, abs_of_nonpos]
@[to_additive (attr := simp) norm_natAbs_smul]
theorem norm_pow_natAbs (a : E) (n : ℤ) : ‖a ^ n.natAbs‖ = ‖a ^ n‖ := by
rw [← zpow_natCast, ← Int.abs_eq_natAbs, norm_zpow_abs]
@[to_additive norm_isUnit_zsmul]
theorem norm_zpow_isUnit (a : E) {n : ℤ} (hn : IsUnit n) : ‖a ^ n‖ = ‖a‖ := by
rw [← norm_pow_natAbs, Int.isUnit_iff_natAbs_eq.mp hn, pow_one]
@[simp]
theorem norm_units_zsmul {E : Type*} [SeminormedAddGroup E] (n : ℤˣ) (a : E) : ‖n • a‖ = ‖a‖ :=
norm_isUnit_zsmul a n.isUnit
open scoped symmDiff in
@[to_additive]
theorem dist_mulIndicator (s t : Set α) (f : α → E) (x : α) :
dist (s.mulIndicator f x) (t.mulIndicator f x) = ‖(s ∆ t).mulIndicator f x‖ := by
rw [dist_eq_norm_div, Set.apply_mulIndicator_symmDiff norm_inv']
/-- **Triangle inequality** for the norm. -/
@[to_additive norm_add_le "**Triangle inequality** for the norm."]
theorem norm_mul_le' (a b : E) : ‖a * b‖ ≤ ‖a‖ + ‖b‖ := by
simpa [dist_eq_norm_div] using dist_triangle a 1 b⁻¹
/-- **Triangle inequality** for the norm. -/
@[to_additive norm_add_le_of_le "**Triangle inequality** for the norm."]
theorem norm_mul_le_of_le' (h₁ : ‖a₁‖ ≤ r₁) (h₂ : ‖a₂‖ ≤ r₂) : ‖a₁ * a₂‖ ≤ r₁ + r₂ :=
(norm_mul_le' a₁ a₂).trans <| add_le_add h₁ h₂
/-- **Triangle inequality** for the norm. -/
@[to_additive norm_add₃_le "**Triangle inequality** for the norm."]
lemma norm_mul₃_le' : ‖a * b * c‖ ≤ ‖a‖ + ‖b‖ + ‖c‖ := norm_mul_le_of_le' (norm_mul_le' _ _) le_rfl
@[to_additive]
lemma norm_div_le_norm_div_add_norm_div (a b c : E) : ‖a / c‖ ≤ ‖a / b‖ + ‖b / c‖ := by
simpa only [dist_eq_norm_div] using dist_triangle a b c
@[to_additive (attr := simp) norm_nonneg]
theorem norm_nonneg' (a : E) : 0 ≤ ‖a‖ := by
rw [← dist_one_right]
exact dist_nonneg
attribute [bound] norm_nonneg
@[to_additive (attr := simp) abs_norm]
theorem abs_norm' (z : E) : |‖z‖| = ‖z‖ := abs_of_nonneg <| norm_nonneg' _
@[to_additive (attr := simp) norm_zero]
theorem norm_one' : ‖(1 : E)‖ = 0 := by rw [← dist_one_right, dist_self]
@[to_additive]
theorem ne_one_of_norm_ne_zero : ‖a‖ ≠ 0 → a ≠ 1 :=
mt <| by
rintro rfl
exact norm_one'
@[to_additive (attr := nontriviality) norm_of_subsingleton]
theorem norm_of_subsingleton' [Subsingleton E] (a : E) : ‖a‖ = 0 := by
rw [Subsingleton.elim a 1, norm_one']
@[to_additive zero_lt_one_add_norm_sq]
theorem zero_lt_one_add_norm_sq' (x : E) : 0 < 1 + ‖x‖ ^ 2 := by
positivity
@[to_additive]
theorem norm_div_le (a b : E) : ‖a / b‖ ≤ ‖a‖ + ‖b‖ := by
simpa [dist_eq_norm_div] using dist_triangle a 1 b
attribute [bound] norm_sub_le
@[to_additive]
theorem norm_div_le_of_le {r₁ r₂ : ℝ} (H₁ : ‖a₁‖ ≤ r₁) (H₂ : ‖a₂‖ ≤ r₂) : ‖a₁ / a₂‖ ≤ r₁ + r₂ :=
(norm_div_le a₁ a₂).trans <| add_le_add H₁ H₂
@[to_additive dist_le_norm_add_norm]
theorem dist_le_norm_add_norm' (a b : E) : dist a b ≤ ‖a‖ + ‖b‖ := by
rw [dist_eq_norm_div]
apply norm_div_le
@[to_additive abs_norm_sub_norm_le]
theorem abs_norm_sub_norm_le' (a b : E) : |‖a‖ - ‖b‖| ≤ ‖a / b‖ := by
simpa [dist_eq_norm_div] using abs_dist_sub_le a b 1
@[to_additive norm_sub_norm_le]
theorem norm_sub_norm_le' (a b : E) : ‖a‖ - ‖b‖ ≤ ‖a / b‖ :=
(le_abs_self _).trans (abs_norm_sub_norm_le' a b)
@[to_additive (attr := bound)]
theorem norm_sub_le_norm_mul (a b : E) : ‖a‖ - ‖b‖ ≤ ‖a * b‖ := by
simpa using norm_mul_le' (a * b) (b⁻¹)
@[to_additive dist_norm_norm_le]
theorem dist_norm_norm_le' (a b : E) : dist ‖a‖ ‖b‖ ≤ ‖a / b‖ :=
abs_norm_sub_norm_le' a b
@[to_additive]
theorem norm_le_norm_add_norm_div' (u v : E) : ‖u‖ ≤ ‖v‖ + ‖u / v‖ := by
rw [add_comm]
refine (norm_mul_le' _ _).trans_eq' ?_
rw [div_mul_cancel]
@[to_additive]
theorem norm_le_norm_add_norm_div (u v : E) : ‖v‖ ≤ ‖u‖ + ‖u / v‖ := by
rw [norm_div_rev]
exact norm_le_norm_add_norm_div' v u
alias norm_le_insert' := norm_le_norm_add_norm_sub'
alias norm_le_insert := norm_le_norm_add_norm_sub
@[to_additive]
theorem norm_le_mul_norm_add (u v : E) : ‖u‖ ≤ ‖u * v‖ + ‖v‖ :=
calc
‖u‖ = ‖u * v / v‖ := by rw [mul_div_cancel_right]
_ ≤ ‖u * v‖ + ‖v‖ := norm_div_le _ _
/-- An analogue of `norm_le_mul_norm_add` for the multiplication from the left. -/
@[to_additive "An analogue of `norm_le_add_norm_add` for the addition from the left."]
theorem norm_le_mul_norm_add' (u v : E) : ‖v‖ ≤ ‖u * v‖ + ‖u‖ :=
calc
‖v‖ = ‖u⁻¹ * (u * v)‖ := by rw [← mul_assoc, inv_mul_cancel, one_mul]
_ ≤ ‖u⁻¹‖ + ‖u * v‖ := norm_mul_le' u⁻¹ (u * v)
_ = ‖u * v‖ + ‖u‖ := by rw [norm_inv', add_comm]
@[to_additive]
lemma norm_mul_eq_norm_right {x : E} (y : E) (h : ‖x‖ = 0) : ‖x * y‖ = ‖y‖ := by
apply le_antisymm ?_ ?_
· simpa [h] using norm_mul_le' x y
· simpa [h] using norm_le_mul_norm_add' x y
@[to_additive]
lemma norm_mul_eq_norm_left (x : E) {y : E} (h : ‖y‖ = 0) : ‖x * y‖ = ‖x‖ := by
apply le_antisymm ?_ ?_
· simpa [h] using norm_mul_le' x y
· simpa [h] using norm_le_mul_norm_add x y
@[to_additive]
lemma norm_div_eq_norm_right {x : E} (y : E) (h : ‖x‖ = 0) : ‖x / y‖ = ‖y‖ := by
apply le_antisymm ?_ ?_
· simpa [h] using norm_div_le x y
· simpa [h, norm_div_rev x y] using norm_sub_norm_le' y x
@[to_additive]
lemma norm_div_eq_norm_left (x : E) {y : E} (h : ‖y‖ = 0) : ‖x / y‖ = ‖x‖ := by
apply le_antisymm ?_ ?_
· simpa [h] using norm_div_le x y
· simpa [h] using norm_sub_norm_le' x y
@[to_additive ball_eq]
theorem ball_eq' (y : E) (ε : ℝ) : ball y ε = { x | ‖x / y‖ < ε } :=
Set.ext fun a => by simp [dist_eq_norm_div]
@[to_additive]
theorem ball_one_eq (r : ℝ) : ball (1 : E) r = { x | ‖x‖ < r } :=
Set.ext fun a => by simp
@[to_additive mem_ball_iff_norm]
theorem mem_ball_iff_norm'' : b ∈ ball a r ↔ ‖b / a‖ < r := by rw [mem_ball, dist_eq_norm_div]
@[to_additive mem_ball_iff_norm']
theorem mem_ball_iff_norm''' : b ∈ ball a r ↔ ‖a / b‖ < r := by rw [mem_ball', dist_eq_norm_div]
@[to_additive]
theorem mem_ball_one_iff : a ∈ ball (1 : E) r ↔ ‖a‖ < r := by rw [mem_ball, dist_one_right]
@[to_additive mem_closedBall_iff_norm]
theorem mem_closedBall_iff_norm'' : b ∈ closedBall a r ↔ ‖b / a‖ ≤ r := by
rw [mem_closedBall, dist_eq_norm_div]
@[to_additive]
theorem mem_closedBall_one_iff : a ∈ closedBall (1 : E) r ↔ ‖a‖ ≤ r := by
rw [mem_closedBall, dist_one_right]
@[to_additive mem_closedBall_iff_norm']
theorem mem_closedBall_iff_norm''' : b ∈ closedBall a r ↔ ‖a / b‖ ≤ r := by
rw [mem_closedBall', dist_eq_norm_div]
@[to_additive norm_le_of_mem_closedBall]
theorem norm_le_of_mem_closedBall' (h : b ∈ closedBall a r) : ‖b‖ ≤ ‖a‖ + r :=
(norm_le_norm_add_norm_div' _ _).trans <| add_le_add_left (by rwa [← dist_eq_norm_div]) _
@[to_additive norm_le_norm_add_const_of_dist_le]
theorem norm_le_norm_add_const_of_dist_le' : dist a b ≤ r → ‖a‖ ≤ ‖b‖ + r :=
norm_le_of_mem_closedBall'
@[to_additive norm_lt_of_mem_ball]
theorem norm_lt_of_mem_ball' (h : b ∈ ball a r) : ‖b‖ < ‖a‖ + r :=
(norm_le_norm_add_norm_div' _ _).trans_lt <| add_lt_add_left (by rwa [← dist_eq_norm_div]) _
@[to_additive]
theorem norm_div_sub_norm_div_le_norm_div (u v w : E) : ‖u / w‖ - ‖v / w‖ ≤ ‖u / v‖ := by
simpa only [div_div_div_cancel_right] using norm_sub_norm_le' (u / w) (v / w)
@[to_additive (attr := simp 1001) mem_sphere_iff_norm]
-- Porting note: increase priority so the left-hand side doesn't reduce
theorem mem_sphere_iff_norm' : b ∈ sphere a r ↔ ‖b / a‖ = r := by simp [dist_eq_norm_div]
@[to_additive] -- `simp` can prove this
theorem mem_sphere_one_iff_norm : a ∈ sphere (1 : E) r ↔ ‖a‖ = r := by simp [dist_eq_norm_div]
@[to_additive (attr := simp) norm_eq_of_mem_sphere]
theorem norm_eq_of_mem_sphere' (x : sphere (1 : E) r) : ‖(x : E)‖ = r :=
mem_sphere_one_iff_norm.mp x.2
@[to_additive]
theorem ne_one_of_mem_sphere (hr : r ≠ 0) (x : sphere (1 : E) r) : (x : E) ≠ 1 :=
ne_one_of_norm_ne_zero <| by rwa [norm_eq_of_mem_sphere' x]
@[to_additive ne_zero_of_mem_unit_sphere]
theorem ne_one_of_mem_unit_sphere (x : sphere (1 : E) 1) : (x : E) ≠ 1 :=
ne_one_of_mem_sphere one_ne_zero _
variable (E)
/-- The norm of a seminormed group as a group seminorm. -/
@[to_additive "The norm of a seminormed group as an additive group seminorm."]
def normGroupSeminorm : GroupSeminorm E :=
⟨norm, norm_one', norm_mul_le', norm_inv'⟩
@[to_additive (attr := simp)]
theorem coe_normGroupSeminorm : ⇑(normGroupSeminorm E) = norm :=
rfl
variable {E}
@[to_additive]
theorem NormedCommGroup.tendsto_nhds_one {f : α → E} {l : Filter α} :
Tendsto f l (𝓝 1) ↔ ∀ ε > 0, ∀ᶠ x in l, ‖f x‖ < ε :=
Metric.tendsto_nhds.trans <| by simp only [dist_one_right]
@[to_additive]
theorem NormedCommGroup.tendsto_nhds_nhds {f : E → F} {x : E} {y : F} :
Tendsto f (𝓝 x) (𝓝 y) ↔ ∀ ε > 0, ∃ δ > 0, ∀ x', ‖x' / x‖ < δ → ‖f x' / y‖ < ε := by
simp_rw [Metric.tendsto_nhds_nhds, dist_eq_norm_div]
@[to_additive]
theorem NormedCommGroup.nhds_basis_norm_lt (x : E) :
(𝓝 x).HasBasis (fun ε : ℝ => 0 < ε) fun ε => { y | ‖y / x‖ < ε } := by
simp_rw [← ball_eq']
exact Metric.nhds_basis_ball
@[to_additive]
theorem NormedCommGroup.nhds_one_basis_norm_lt :
(𝓝 (1 : E)).HasBasis (fun ε : ℝ => 0 < ε) fun ε => { y | ‖y‖ < ε } := by
convert NormedCommGroup.nhds_basis_norm_lt (1 : E)
simp
@[to_additive]
theorem NormedCommGroup.uniformity_basis_dist :
(𝓤 E).HasBasis (fun ε : ℝ => 0 < ε) fun ε => { p : E × E | ‖p.fst / p.snd‖ < ε } := by
convert Metric.uniformity_basis_dist (α := E) using 1
simp [dist_eq_norm_div]
open Finset
variable [FunLike 𝓕 E F]
section NNNorm
-- See note [lower instance priority]
@[to_additive]
instance (priority := 100) SeminormedGroup.toNNNorm : NNNorm E :=
⟨fun a => ⟨‖a‖, norm_nonneg' a⟩⟩
@[to_additive (attr := simp, norm_cast) coe_nnnorm]
theorem coe_nnnorm' (a : E) : (‖a‖₊ : ℝ) = ‖a‖ := rfl
@[to_additive (attr := simp) coe_comp_nnnorm]
theorem coe_comp_nnnorm' : (toReal : ℝ≥0 → ℝ) ∘ (nnnorm : E → ℝ≥0) = norm :=
rfl
@[to_additive (attr := simp) norm_toNNReal]
theorem norm_toNNReal' : ‖a‖.toNNReal = ‖a‖₊ :=
@Real.toNNReal_coe ‖a‖₊
@[to_additive (attr := simp) toReal_enorm]
lemma toReal_enorm' (x : E) : ‖x‖ₑ.toReal = ‖x‖ := by simp [enorm]
@[to_additive (attr := simp) ofReal_norm]
lemma ofReal_norm' (x : E) : .ofReal ‖x‖ = ‖x‖ₑ := by
simp [enorm, ENNReal.ofReal, Real.toNNReal, nnnorm]
@[to_additive enorm_eq_iff_norm_eq]
theorem enorm'_eq_iff_norm_eq {x : E} {y : F} : ‖x‖ₑ = ‖y‖ₑ ↔ ‖x‖ = ‖y‖ := by
simp only [← ofReal_norm']
refine ⟨fun h ↦ ?_, fun h ↦ by congr⟩
exact (Real.toNNReal_eq_toNNReal_iff (norm_nonneg' _) (norm_nonneg' _)).mp (ENNReal.coe_inj.mp h)
@[to_additive enorm_le_iff_norm_le]
theorem enorm'_le_iff_norm_le {x : E} {y : F} : ‖x‖ₑ ≤ ‖y‖ₑ ↔ ‖x‖ ≤ ‖y‖ := by
simp only [← ofReal_norm']
refine ⟨fun h ↦ ?_, fun h ↦ by gcongr⟩
rw [ENNReal.ofReal_le_ofReal_iff (norm_nonneg' _)] at h
exact h
@[to_additive]
theorem nndist_eq_nnnorm_div (a b : E) : nndist a b = ‖a / b‖₊ :=
NNReal.eq <| dist_eq_norm_div _ _
alias nndist_eq_nnnorm := nndist_eq_nnnorm_sub
@[to_additive (attr := simp)]
theorem nndist_one_right (a : E) : nndist a 1 = ‖a‖₊ := by simp [nndist_eq_nnnorm_div]
@[to_additive (attr := simp)]
lemma edist_one_right (a : E) : edist a 1 = ‖a‖ₑ := by simp [edist_nndist, nndist_one_right, enorm]
@[to_additive (attr := simp) nnnorm_zero]
theorem nnnorm_one' : ‖(1 : E)‖₊ = 0 := NNReal.eq norm_one'
@[to_additive]
theorem ne_one_of_nnnorm_ne_zero {a : E} : ‖a‖₊ ≠ 0 → a ≠ 1 :=
mt <| by
rintro rfl
exact nnnorm_one'
@[to_additive nnnorm_add_le]
theorem nnnorm_mul_le' (a b : E) : ‖a * b‖₊ ≤ ‖a‖₊ + ‖b‖₊ :=
NNReal.coe_le_coe.1 <| norm_mul_le' a b
@[to_additive norm_nsmul_le]
lemma norm_pow_le_mul_norm : ∀ {n : ℕ}, ‖a ^ n‖ ≤ n * ‖a‖
| 0 => by simp
| n + 1 => by simpa [pow_succ, add_mul] using norm_mul_le_of_le' norm_pow_le_mul_norm le_rfl
@[to_additive nnnorm_nsmul_le]
lemma nnnorm_pow_le_mul_norm {n : ℕ} : ‖a ^ n‖₊ ≤ n * ‖a‖₊ := by
simpa only [← NNReal.coe_le_coe, NNReal.coe_mul, NNReal.coe_natCast] using norm_pow_le_mul_norm
@[to_additive (attr := simp) nnnorm_neg]
theorem nnnorm_inv' (a : E) : ‖a⁻¹‖₊ = ‖a‖₊ :=
NNReal.eq <| norm_inv' a
@[to_additive (attr := simp) nnnorm_abs_zsmul]
theorem nnnorm_zpow_abs (a : E) (n : ℤ) : ‖a ^ |n|‖₊ = ‖a ^ n‖₊ :=
NNReal.eq <| norm_zpow_abs a n
@[to_additive (attr := simp) nnnorm_natAbs_smul]
theorem nnnorm_pow_natAbs (a : E) (n : ℤ) : ‖a ^ n.natAbs‖₊ = ‖a ^ n‖₊ :=
NNReal.eq <| norm_pow_natAbs a n
@[to_additive nnnorm_isUnit_zsmul]
theorem nnnorm_zpow_isUnit (a : E) {n : ℤ} (hn : IsUnit n) : ‖a ^ n‖₊ = ‖a‖₊ :=
NNReal.eq <| norm_zpow_isUnit a hn
@[simp]
theorem nnnorm_units_zsmul {E : Type*} [SeminormedAddGroup E] (n : ℤˣ) (a : E) : ‖n • a‖₊ = ‖a‖₊ :=
NNReal.eq <| norm_isUnit_zsmul a n.isUnit
@[to_additive (attr := simp)]
theorem nndist_one_left (a : E) : nndist 1 a = ‖a‖₊ := by simp [nndist_eq_nnnorm_div]
@[to_additive (attr := simp)]
theorem edist_one_left (a : E) : edist 1 a = ‖a‖₊ := by
rw [edist_nndist, nndist_one_left]
open scoped symmDiff in
@[to_additive]
theorem nndist_mulIndicator (s t : Set α) (f : α → E) (x : α) :
nndist (s.mulIndicator f x) (t.mulIndicator f x) = ‖(s ∆ t).mulIndicator f x‖₊ :=
NNReal.eq <| dist_mulIndicator s t f x
@[to_additive]
theorem nnnorm_div_le (a b : E) : ‖a / b‖₊ ≤ ‖a‖₊ + ‖b‖₊ :=
NNReal.coe_le_coe.1 <| norm_div_le _ _
@[to_additive]
lemma enorm_div_le : ‖a / b‖ₑ ≤ ‖a‖ₑ + ‖b‖ₑ := by
simpa [enorm, ← ENNReal.coe_add] using nnnorm_div_le a b
@[to_additive nndist_nnnorm_nnnorm_le]
theorem nndist_nnnorm_nnnorm_le' (a b : E) : nndist ‖a‖₊ ‖b‖₊ ≤ ‖a / b‖₊ :=
NNReal.coe_le_coe.1 <| dist_norm_norm_le' a b
@[to_additive]
theorem nnnorm_le_nnnorm_add_nnnorm_div (a b : E) : ‖b‖₊ ≤ ‖a‖₊ + ‖a / b‖₊ :=
norm_le_norm_add_norm_div _ _
@[to_additive]
theorem nnnorm_le_nnnorm_add_nnnorm_div' (a b : E) : ‖a‖₊ ≤ ‖b‖₊ + ‖a / b‖₊ :=
norm_le_norm_add_norm_div' _ _
alias nnnorm_le_insert' := nnnorm_le_nnnorm_add_nnnorm_sub'
alias nnnorm_le_insert := nnnorm_le_nnnorm_add_nnnorm_sub
@[to_additive]
theorem nnnorm_le_mul_nnnorm_add (a b : E) : ‖a‖₊ ≤ ‖a * b‖₊ + ‖b‖₊ :=
norm_le_mul_norm_add _ _
/-- An analogue of `nnnorm_le_mul_nnnorm_add` for the multiplication from the left. -/
@[to_additive "An analogue of `nnnorm_le_add_nnnorm_add` for the addition from the left."]
theorem nnnorm_le_mul_nnnorm_add' (a b : E) : ‖b‖₊ ≤ ‖a * b‖₊ + ‖a‖₊ :=
norm_le_mul_norm_add' _ _
@[to_additive]
lemma nnnorm_mul_eq_nnnorm_right {x : E} (y : E) (h : ‖x‖₊ = 0) : ‖x * y‖₊ = ‖y‖₊ :=
NNReal.eq <| norm_mul_eq_norm_right _ <| congr_arg NNReal.toReal h
@[to_additive]
lemma nnnorm_mul_eq_nnnorm_left (x : E) {y : E} (h : ‖y‖₊ = 0) : ‖x * y‖₊ = ‖x‖₊ :=
NNReal.eq <| norm_mul_eq_norm_left _ <| congr_arg NNReal.toReal h
@[to_additive]
lemma nnnorm_div_eq_nnnorm_right {x : E} (y : E) (h : ‖x‖₊ = 0) : ‖x / y‖₊ = ‖y‖₊ :=
NNReal.eq <| norm_div_eq_norm_right _ <| congr_arg NNReal.toReal h
@[to_additive]
lemma nnnorm_div_eq_nnnorm_left (x : E) {y : E} (h : ‖y‖₊ = 0) : ‖x / y‖₊ = ‖x‖₊ :=
NNReal.eq <| norm_div_eq_norm_left _ <| congr_arg NNReal.toReal h
/-- The non negative norm seen as an `ENNReal` and then as a `Real` is equal to the norm. -/
@[to_additive toReal_coe_nnnorm "The non negative norm seen as an `ENNReal` and
then as a `Real` is equal to the norm."]
theorem toReal_coe_nnnorm' (a : E) : (‖a‖₊ : ℝ≥0∞).toReal = ‖a‖ := rfl
open scoped symmDiff in
@[to_additive]
theorem edist_mulIndicator (s t : Set α) (f : α → E) (x : α) :
edist (s.mulIndicator f x) (t.mulIndicator f x) = ‖(s ∆ t).mulIndicator f x‖₊ := by
rw [edist_nndist, nndist_mulIndicator]
end NNNorm
section ENorm
@[to_additive (attr := simp) enorm_zero]
lemma enorm_one' {E : Type*} [TopologicalSpace E] [ENormedMonoid E] : ‖(1 : E)‖ₑ = 0 := by
rw [ENormedMonoid.enorm_eq_zero]
@[to_additive exists_enorm_lt]
lemma exists_enorm_lt' (E : Type*) [TopologicalSpace E] [ENormedMonoid E]
[hbot : NeBot (𝓝[≠] (1 : E))] {c : ℝ≥0∞} (hc : c ≠ 0) : ∃ x ≠ (1 : E), ‖x‖ₑ < c :=
frequently_iff_neBot.mpr hbot |>.and_eventually
(ContinuousENorm.continuous_enorm.tendsto' 1 0 (by simp) |>.eventually_lt_const hc.bot_lt)
|>.exists
@[to_additive (attr := simp) enorm_neg]
lemma enorm_inv' (a : E) : ‖a⁻¹‖ₑ = ‖a‖ₑ := by simp [enorm]
@[to_additive ofReal_norm_eq_enorm]
lemma ofReal_norm_eq_enorm' (a : E) : .ofReal ‖a‖ = ‖a‖ₑ := ENNReal.ofReal_eq_coe_nnreal _
@[deprecated (since := "2025-01-17")] alias ofReal_norm_eq_coe_nnnorm := ofReal_norm_eq_enorm
@[deprecated (since := "2025-01-17")] alias ofReal_norm_eq_coe_nnnorm' := ofReal_norm_eq_enorm'
instance : ENorm ℝ≥0∞ where
enorm x := x
@[simp] lemma enorm_eq_self (x : ℝ≥0∞) : ‖x‖ₑ = x := rfl
@[to_additive]
theorem edist_eq_enorm_div (a b : E) : edist a b = ‖a / b‖ₑ := by
rw [edist_dist, dist_eq_norm_div, ofReal_norm_eq_enorm']
@[deprecated (since := "2025-01-17")] alias edist_eq_coe_nnnorm_sub := edist_eq_enorm_sub
@[deprecated (since := "2025-01-17")] alias edist_eq_coe_nnnorm_div := edist_eq_enorm_div
@[to_additive]
| theorem edist_one_eq_enorm (x : E) : edist x 1 = ‖x‖ₑ := by rw [edist_eq_enorm_div, div_one]
@[deprecated (since := "2025-01-17")] alias edist_eq_coe_nnnorm := edist_zero_eq_enorm
| Mathlib/Analysis/Normed/Group/Basic.lean | 884 | 886 |
/-
Copyright (c) 2018 Alexander Bentkamp. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Alexander Bentkamp
-/
import Mathlib.Data.Nat.Find
import Mathlib.Algebra.Module.Pi
import Mathlib.Algebra.BigOperators.Group.Finset.Basic
/-!
# Basic properties of holors
Holors are indexed collections of tensor coefficients. Confusingly,
they are often called tensors in physics and in the neural network
community.
A holor is simply a multidimensional array of values. The size of a
holor is specified by a `List ℕ`, whose length is called the dimension
of the holor.
The tensor product of `x₁ : Holor α ds₁` and `x₂ : Holor α ds₂` is the
holor given by `(x₁ ⊗ x₂) (i₁ ++ i₂) = x₁ i₁ * x₂ i₂`. A holor is "of
rank at most 1" if it is a tensor product of one-dimensional holors.
The CP rank of a holor `x` is the smallest N such that `x` is the sum
of N holors of rank at most 1.
Based on the tensor library found in <https://www.isa-afp.org/entries/Deep_Learning.html>
## References
* <https://en.wikipedia.org/wiki/Tensor_rank_decomposition>
-/
universe u
open List
/-- `HolorIndex ds` is the type of valid index tuples used to identify an entry of a holor
of dimensions `ds`. -/
def HolorIndex (ds : List ℕ) : Type :=
{ is : List ℕ // Forall₂ (· < ·) is ds }
namespace HolorIndex
variable {ds₁ ds₂ ds₃ : List ℕ}
/-- Take the first elements of a `HolorIndex`. -/
def take : ∀ {ds₁ : List ℕ}, HolorIndex (ds₁ ++ ds₂) → HolorIndex ds₁
| ds, is => ⟨List.take (length ds) is.1, forall₂_take_append is.1 ds ds₂ is.2⟩
/-- Drop the first elements of a `HolorIndex`. -/
def drop : ∀ {ds₁ : List ℕ}, HolorIndex (ds₁ ++ ds₂) → HolorIndex ds₂
| ds, is => ⟨List.drop (length ds) is.1, forall₂_drop_append is.1 ds ds₂ is.2⟩
theorem cast_type (is : List ℕ) (eq : ds₁ = ds₂) (h : Forall₂ (· < ·) is ds₁) :
(cast (congr_arg HolorIndex eq) ⟨is, h⟩).val = is := by subst eq; rfl
/-- Right associator for `HolorIndex` -/
def assocRight : HolorIndex (ds₁ ++ ds₂ ++ ds₃) → HolorIndex (ds₁ ++ (ds₂ ++ ds₃)) :=
cast (congr_arg HolorIndex (append_assoc ds₁ ds₂ ds₃))
/-- Left associator for `HolorIndex` -/
def assocLeft : HolorIndex (ds₁ ++ (ds₂ ++ ds₃)) → HolorIndex (ds₁ ++ ds₂ ++ ds₃) :=
cast (congr_arg HolorIndex (append_assoc ds₁ ds₂ ds₃).symm)
theorem take_take : ∀ t : HolorIndex (ds₁ ++ ds₂ ++ ds₃), t.assocRight.take = t.take.take
| ⟨is, h⟩ =>
Subtype.eq <| by
| simp [assocRight, take, cast_type, List.take_take, Nat.le_add_right, min_eq_left]
theorem drop_take : ∀ t : HolorIndex (ds₁ ++ ds₂ ++ ds₃), t.assocRight.drop.take = t.take.drop
| ⟨is, h⟩ => Subtype.eq (by simp [assocRight, take, drop, cast_type, List.drop_take])
| Mathlib/Data/Holor.lean | 70 | 73 |
/-
Copyright (c) 2017 Mario Carneiro. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Mario Carneiro
-/
import Mathlib.Algebra.Order.Group.Unbundled.Int
import Mathlib.Algebra.Ring.Nat
import Mathlib.Data.Int.GCD
/-!
# Congruences modulo a natural number
This file defines the equivalence relation `a ≡ b [MOD n]` on the natural numbers,
and proves basic properties about it such as the Chinese Remainder Theorem
`modEq_and_modEq_iff_modEq_mul`.
## Notations
`a ≡ b [MOD n]` is notation for `nat.ModEq n a b`, which is defined to mean `a % n = b % n`.
## Tags
ModEq, congruence, mod, MOD, modulo
-/
assert_not_exists OrderedAddCommMonoid Function.support
namespace Nat
/-- Modular equality. `n.ModEq a b`, or `a ≡ b [MOD n]`, means that `a - b` is a multiple of `n`. -/
def ModEq (n a b : ℕ) :=
a % n = b % n
@[inherit_doc]
notation:50 a " ≡ " b " [MOD " n "]" => ModEq n a b
variable {m n a b c d : ℕ}
-- Since `ModEq` is semi-reducible, we need to provide the decidable instance manually
instance : Decidable (ModEq n a b) := inferInstanceAs <| Decidable (a % n = b % n)
namespace ModEq
@[refl]
protected theorem refl (a : ℕ) : a ≡ a [MOD n] := rfl
protected theorem rfl : a ≡ a [MOD n] :=
ModEq.refl _
instance : IsRefl _ (ModEq n) :=
⟨ModEq.refl⟩
@[symm]
protected theorem symm : a ≡ b [MOD n] → b ≡ a [MOD n] :=
Eq.symm
@[trans]
protected theorem trans : a ≡ b [MOD n] → b ≡ c [MOD n] → a ≡ c [MOD n] :=
Eq.trans
instance : Trans (ModEq n) (ModEq n) (ModEq n) where
trans := Nat.ModEq.trans
protected theorem comm : a ≡ b [MOD n] ↔ b ≡ a [MOD n] :=
⟨ModEq.symm, ModEq.symm⟩
end ModEq
theorem modEq_zero_iff_dvd : a ≡ 0 [MOD n] ↔ n ∣ a := by rw [ModEq, zero_mod, dvd_iff_mod_eq_zero]
theorem _root_.Dvd.dvd.modEq_zero_nat (h : n ∣ a) : a ≡ 0 [MOD n] :=
modEq_zero_iff_dvd.2 h
theorem _root_.Dvd.dvd.zero_modEq_nat (h : n ∣ a) : 0 ≡ a [MOD n] :=
h.modEq_zero_nat.symm
theorem modEq_iff_dvd : a ≡ b [MOD n] ↔ (n : ℤ) ∣ b - a := by
rw [ModEq, eq_comm, ← Int.natCast_inj, Int.natCast_mod, Int.natCast_mod,
Int.emod_eq_emod_iff_emod_sub_eq_zero, Int.dvd_iff_emod_eq_zero]
alias ⟨ModEq.dvd, modEq_of_dvd⟩ := modEq_iff_dvd
/-- A variant of `modEq_iff_dvd` with `Nat` divisibility -/
theorem modEq_iff_dvd' (h : a ≤ b) : a ≡ b [MOD n] ↔ n ∣ b - a := by
rw [modEq_iff_dvd, ← Int.natCast_dvd_natCast, Int.ofNat_sub h]
theorem mod_modEq (a n) : a % n ≡ a [MOD n] :=
mod_mod _ _
namespace ModEq
lemma of_dvd (d : m ∣ n) (h : a ≡ b [MOD n]) : a ≡ b [MOD m] :=
modEq_of_dvd <| Int.ofNat_dvd.mpr d |>.trans h.dvd
protected theorem mul_left' (c : ℕ) (h : a ≡ b [MOD n]) : c * a ≡ c * b [MOD c * n] := by
unfold ModEq at *; rw [mul_mod_mul_left, mul_mod_mul_left, h]
@[gcongr]
protected theorem mul_left (c : ℕ) (h : a ≡ b [MOD n]) : c * a ≡ c * b [MOD n] :=
(h.mul_left' _).of_dvd (dvd_mul_left _ _)
protected theorem mul_right' (c : ℕ) (h : a ≡ b [MOD n]) : a * c ≡ b * c [MOD n * c] := by
rw [mul_comm a, mul_comm b, mul_comm n]; exact h.mul_left' c
@[gcongr]
protected theorem mul_right (c : ℕ) (h : a ≡ b [MOD n]) : a * c ≡ b * c [MOD n] := by
rw [mul_comm a, mul_comm b]; exact h.mul_left c
@[gcongr]
protected theorem mul (h₁ : a ≡ b [MOD n]) (h₂ : c ≡ d [MOD n]) : a * c ≡ b * d [MOD n] :=
(h₂.mul_left _).trans (h₁.mul_right _)
@[gcongr]
protected theorem pow (m : ℕ) (h : a ≡ b [MOD n]) : a ^ m ≡ b ^ m [MOD n] := by
induction m with
| zero => rfl
| succ d hd =>
rw [Nat.pow_succ, Nat.pow_succ]
exact hd.mul h
@[gcongr]
protected theorem add (h₁ : a ≡ b [MOD n]) (h₂ : c ≡ d [MOD n]) : a + c ≡ b + d [MOD n] := by
rw [modEq_iff_dvd, Int.natCast_add, Int.natCast_add, add_sub_add_comm]
exact Int.dvd_add h₁.dvd h₂.dvd
@[gcongr]
protected theorem add_left (c : ℕ) (h : a ≡ b [MOD n]) : c + a ≡ c + b [MOD n] :=
ModEq.rfl.add h
@[gcongr]
protected theorem add_right (c : ℕ) (h : a ≡ b [MOD n]) : a + c ≡ b + c [MOD n] :=
h.add ModEq.rfl
protected theorem add_left_cancel (h₁ : a ≡ b [MOD n]) (h₂ : a + c ≡ b + d [MOD n]) :
c ≡ d [MOD n] := by
simp only [modEq_iff_dvd, Int.natCast_add] at *
rw [add_sub_add_comm] at h₂
convert Int.dvd_sub h₂ h₁ using 1
rw [add_sub_cancel_left]
protected theorem add_left_cancel' (c : ℕ) (h : c + a ≡ c + b [MOD n]) : a ≡ b [MOD n] :=
ModEq.rfl.add_left_cancel h
protected theorem add_right_cancel (h₁ : c ≡ d [MOD n]) (h₂ : a + c ≡ b + d [MOD n]) :
a ≡ b [MOD n] := by
rw [add_comm a, add_comm b] at h₂
exact h₁.add_left_cancel h₂
protected theorem add_right_cancel' (c : ℕ) (h : a + c ≡ b + c [MOD n]) : a ≡ b [MOD n] :=
ModEq.rfl.add_right_cancel h
/-- Cancel left multiplication on both sides of the `≡` and in the modulus.
For cancelling left multiplication in the modulus, see `Nat.ModEq.of_mul_left`. -/
protected theorem mul_left_cancel' {a b c m : ℕ} (hc : c ≠ 0) :
c * a ≡ c * b [MOD c * m] → a ≡ b [MOD m] := by
simp only [modEq_iff_dvd, Int.natCast_mul, ← Int.mul_sub]
exact fun h => (Int.dvd_of_mul_dvd_mul_left (Int.ofNat_ne_zero.mpr hc) h)
protected theorem mul_left_cancel_iff' {a b c m : ℕ} (hc : c ≠ 0) :
c * a ≡ c * b [MOD c * m] ↔ a ≡ b [MOD m] :=
⟨ModEq.mul_left_cancel' hc, ModEq.mul_left' _⟩
/-- Cancel right multiplication on both sides of the `≡` and in the modulus.
For cancelling right multiplication in the modulus, see `Nat.ModEq.of_mul_right`. -/
protected theorem mul_right_cancel' {a b c m : ℕ} (hc : c ≠ 0) :
a * c ≡ b * c [MOD m * c] → a ≡ b [MOD m] := by
simp only [modEq_iff_dvd, Int.natCast_mul, ← Int.sub_mul]
exact fun h => (Int.dvd_of_mul_dvd_mul_right (Int.ofNat_ne_zero.mpr hc) h)
protected theorem mul_right_cancel_iff' {a b c m : ℕ} (hc : c ≠ 0) :
a * c ≡ b * c [MOD m * c] ↔ a ≡ b [MOD m] :=
⟨ModEq.mul_right_cancel' hc, ModEq.mul_right' _⟩
/-- Cancel left multiplication in the modulus.
For cancelling left multiplication on both sides of the `≡`, see `nat.modeq.mul_left_cancel'`. -/
lemma of_mul_left (m : ℕ) (h : a ≡ b [MOD m * n]) : a ≡ b [MOD n] := by
rw [modEq_iff_dvd] at *
exact (dvd_mul_left (n : ℤ) (m : ℤ)).trans h
/-- Cancel right multiplication in the modulus.
For cancelling right multiplication on both sides of the `≡`, see `nat.modeq.mul_right_cancel'`. -/
lemma of_mul_right (m : ℕ) : a ≡ b [MOD n * m] → a ≡ b [MOD n] := mul_comm m n ▸ of_mul_left _
theorem of_div (h : a / c ≡ b / c [MOD m / c]) (ha : c ∣ a) (ha : c ∣ b) (ha : c ∣ m) :
a ≡ b [MOD m] := by convert h.mul_left' c <;> rwa [Nat.mul_div_cancel']
end ModEq
lemma modEq_sub (h : b ≤ a) : a ≡ b [MOD a - b] := (modEq_of_dvd <| by rw [Int.ofNat_sub h]).symm
lemma modEq_one : a ≡ b [MOD 1] := modEq_of_dvd <| one_dvd _
@[simp] lemma modEq_zero_iff : a ≡ b [MOD 0] ↔ a = b := by rw [ModEq, mod_zero, mod_zero]
@[simp] lemma add_modEq_left : n + a ≡ a [MOD n] := by rw [ModEq, add_mod_left]
@[simp] lemma add_modEq_right : a + n ≡ a [MOD n] := by rw [ModEq, add_mod_right]
namespace ModEq
theorem le_of_lt_add (h1 : a ≡ b [MOD m]) (h2 : a < b + m) : a ≤ b :=
(le_total a b).elim id fun h3 =>
Nat.le_of_sub_eq_zero
(eq_zero_of_dvd_of_lt ((modEq_iff_dvd' h3).mp h1.symm) (by omega))
theorem add_le_of_lt (h1 : a ≡ b [MOD m]) (h2 : a < b) : a + m ≤ b :=
le_of_lt_add (add_modEq_right.trans h1) (by omega)
theorem dvd_iff (h : a ≡ b [MOD m]) (hdm : d ∣ m) : d ∣ a ↔ d ∣ b := by
simp only [← modEq_zero_iff_dvd]
replace h := h.of_dvd hdm
exact ⟨h.symm.trans, h.trans⟩
theorem gcd_eq (h : a ≡ b [MOD m]) : gcd a m = gcd b m := by
have h1 := gcd_dvd_right a m
have h2 := gcd_dvd_right b m
exact
dvd_antisymm (dvd_gcd ((h.dvd_iff h1).mp (gcd_dvd_left a m)) h1)
(dvd_gcd ((h.dvd_iff h2).mpr (gcd_dvd_left b m)) h2)
lemma eq_of_abs_lt (h : a ≡ b [MOD m]) (h2 : |(b : ℤ) - a| < m) : a = b := by
apply Int.ofNat.inj
rw [eq_comm, ← sub_eq_zero]
exact Int.eq_zero_of_abs_lt_dvd h.dvd h2
lemma eq_of_lt_of_lt (h : a ≡ b [MOD m]) (ha : a < m) (hb : b < m) : a = b :=
h.eq_of_abs_lt <| Int.abs_sub_lt_of_lt_lt ha hb
/-- To cancel a common factor `c` from a `ModEq` we must divide the modulus `m` by `gcd m c` -/
lemma cancel_left_div_gcd (hm : 0 < m) (h : c * a ≡ c * b [MOD m]) : a ≡ b [MOD m / gcd m c] := by
let d := gcd m c
have hmd := gcd_dvd_left m c
have hcd := gcd_dvd_right m c
rw [modEq_iff_dvd]
refine @Int.dvd_of_dvd_mul_right_of_gcd_one (m / d) (c / d) (b - a) ?_ ?_
· show (m / d : ℤ) ∣ c / d * (b - a)
rw [mul_comm, ← Int.mul_ediv_assoc (b - a) (Int.natCast_dvd_natCast.mpr hcd), mul_comm]
apply Int.ediv_dvd_ediv (Int.natCast_dvd_natCast.mpr hmd)
rw [Int.mul_sub]
exact modEq_iff_dvd.mp h
· show Int.gcd (m / d) (c / d) = 1
simp only [d, ← Int.natCast_div, Int.gcd_natCast_natCast (m / d) (c / d),
gcd_div hmd hcd, Nat.div_self (gcd_pos_of_pos_left c hm)]
/-- To cancel a common factor `c` from a `ModEq` we must divide the modulus `m` by `gcd m c` -/
lemma cancel_right_div_gcd (hm : 0 < m) (h : a * c ≡ b * c [MOD m]) : a ≡ b [MOD m / gcd m c] := by
apply cancel_left_div_gcd hm
simpa [mul_comm] using h
lemma cancel_left_div_gcd' (hm : 0 < m) (hcd : c ≡ d [MOD m]) (h : c * a ≡ d * b [MOD m]) :
a ≡ b [MOD m / gcd m c] :=
| (h.trans <| hcd.symm.mul_right b).cancel_left_div_gcd hm
lemma cancel_right_div_gcd' (hm : 0 < m) (hcd : c ≡ d [MOD m]) (h : a * c ≡ b * d [MOD m]) :
a ≡ b [MOD m / gcd m c] :=
| Mathlib/Data/Nat/ModEq.lean | 256 | 259 |
/-
Copyright (c) 2015, 2017 Jeremy Avigad. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Jeremy Avigad, Robert Y. Lewis, Johannes Hölzl, Mario Carneiro, Sébastien Gouëzel
-/
import Mathlib.Data.ENNReal.Real
import Mathlib.Tactic.Bound.Attribute
import Mathlib.Topology.Bornology.Basic
import Mathlib.Topology.EMetricSpace.Defs
import Mathlib.Topology.UniformSpace.Basic
/-!
## Pseudo-metric spaces
This file defines pseudo-metric spaces: these differ from metric spaces by not imposing the
condition `dist x y = 0 → x = y`.
Many definitions and theorems expected on (pseudo-)metric spaces are already introduced on uniform
spaces and topological spaces. For example: open and closed sets, compactness, completeness,
continuity and uniform continuity.
## Main definitions
* `Dist α`: Endows a space `α` with a function `dist a b`.
* `PseudoMetricSpace α`: A space endowed with a distance function, which can
be zero even if the two elements are non-equal.
* `Metric.ball x ε`: The set of all points `y` with `dist y x < ε`.
* `Metric.Bounded s`: Whether a subset of a `PseudoMetricSpace` is bounded.
* `MetricSpace α`: A `PseudoMetricSpace` with the guarantee `dist x y = 0 → x = y`.
Additional useful definitions:
* `nndist a b`: `dist` as a function to the non-negative reals.
* `Metric.closedBall x ε`: The set of all points `y` with `dist y x ≤ ε`.
* `Metric.sphere x ε`: The set of all points `y` with `dist y x = ε`.
TODO (anyone): Add "Main results" section.
## Tags
pseudo_metric, dist
-/
assert_not_exists compactSpace_uniformity
open Set Filter TopologicalSpace Bornology
open scoped ENNReal NNReal Uniformity Topology
universe u v w
variable {α : Type u} {β : Type v} {X ι : Type*}
theorem UniformSpace.ofDist_aux (ε : ℝ) (hε : 0 < ε) : ∃ δ > (0 : ℝ), ∀ x < δ, ∀ y < δ, x + y < ε :=
⟨ε / 2, half_pos hε, fun _x hx _y hy => add_halves ε ▸ add_lt_add hx hy⟩
/-- Construct a uniform structure from a distance function and metric space axioms -/
def UniformSpace.ofDist (dist : α → α → ℝ) (dist_self : ∀ x : α, dist x x = 0)
(dist_comm : ∀ x y : α, dist x y = dist y x)
(dist_triangle : ∀ x y z : α, dist x z ≤ dist x y + dist y z) : UniformSpace α :=
.ofFun dist dist_self dist_comm dist_triangle ofDist_aux
/-- Construct a bornology from a distance function and metric space axioms. -/
abbrev Bornology.ofDist {α : Type*} (dist : α → α → ℝ) (dist_comm : ∀ x y, dist x y = dist y x)
(dist_triangle : ∀ x y z, dist x z ≤ dist x y + dist y z) : Bornology α :=
Bornology.ofBounded { s : Set α | ∃ C, ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → dist x y ≤ C }
⟨0, fun _ hx _ => hx.elim⟩ (fun _ ⟨c, hc⟩ _ h => ⟨c, fun _ hx _ hy => hc (h hx) (h hy)⟩)
(fun s hs t ht => by
rcases s.eq_empty_or_nonempty with rfl | ⟨x, hx⟩
· rwa [empty_union]
rcases t.eq_empty_or_nonempty with rfl | ⟨y, hy⟩
· rwa [union_empty]
rsuffices ⟨C, hC⟩ : ∃ C, ∀ z ∈ s ∪ t, dist x z ≤ C
· refine ⟨C + C, fun a ha b hb => (dist_triangle a x b).trans ?_⟩
simpa only [dist_comm] using add_le_add (hC _ ha) (hC _ hb)
rcases hs with ⟨Cs, hs⟩; rcases ht with ⟨Ct, ht⟩
refine ⟨max Cs (dist x y + Ct), fun z hz => hz.elim
(fun hz => (hs hx hz).trans (le_max_left _ _))
(fun hz => (dist_triangle x y z).trans <|
(add_le_add le_rfl (ht hy hz)).trans (le_max_right _ _))⟩)
fun z => ⟨dist z z, forall_eq.2 <| forall_eq.2 le_rfl⟩
/-- The distance function (given an ambient metric space on `α`), which returns
a nonnegative real number `dist x y` given `x y : α`. -/
@[ext]
class Dist (α : Type*) where
/-- Distance between two points -/
dist : α → α → ℝ
export Dist (dist)
-- the uniform structure and the emetric space structure are embedded in the metric space structure
-- to avoid instance diamond issues. See Note [forgetful inheritance].
/-- This is an internal lemma used inside the default of `PseudoMetricSpace.edist`. -/
private theorem dist_nonneg' {α} {x y : α} (dist : α → α → ℝ)
(dist_self : ∀ x : α, dist x x = 0) (dist_comm : ∀ x y : α, dist x y = dist y x)
(dist_triangle : ∀ x y z : α, dist x z ≤ dist x y + dist y z) : 0 ≤ dist x y :=
have : 0 ≤ 2 * dist x y :=
calc 0 = dist x x := (dist_self _).symm
_ ≤ dist x y + dist y x := dist_triangle _ _ _
_ = 2 * dist x y := by rw [two_mul, dist_comm]
nonneg_of_mul_nonneg_right this two_pos
/-- A pseudometric space is a type endowed with a `ℝ`-valued distance `dist` satisfying
reflexivity `dist x x = 0`, commutativity `dist x y = dist y x`, and the triangle inequality
`dist x z ≤ dist x y + dist y z`.
Note that we do not require `dist x y = 0 → x = y`. See metric spaces (`MetricSpace`) for the
similar class with that stronger assumption.
Any pseudometric space is a topological space and a uniform space (see `TopologicalSpace`,
`UniformSpace`), where the topology and uniformity come from the metric.
Note that a T1 pseudometric space is just a metric space.
We make the uniformity/topology part of the data instead of deriving it from the metric. This eg
ensures that we do not get a diamond when doing
`[PseudoMetricSpace α] [PseudoMetricSpace β] : TopologicalSpace (α × β)`:
The product metric and product topology agree, but not definitionally so.
See Note [forgetful inheritance]. -/
class PseudoMetricSpace (α : Type u) : Type u extends Dist α where
dist_self : ∀ x : α, dist x x = 0
dist_comm : ∀ x y : α, dist x y = dist y x
dist_triangle : ∀ x y z : α, dist x z ≤ dist x y + dist y z
/-- Extended distance between two points -/
edist : α → α → ℝ≥0∞ := fun x y => ENNReal.ofNNReal ⟨dist x y, dist_nonneg' _ ‹_› ‹_› ‹_›⟩
edist_dist : ∀ x y : α, edist x y = ENNReal.ofReal (dist x y) := by
intros x y; exact ENNReal.coe_nnreal_eq _
toUniformSpace : UniformSpace α := .ofDist dist dist_self dist_comm dist_triangle
uniformity_dist : 𝓤 α = ⨅ ε > 0, 𝓟 { p : α × α | dist p.1 p.2 < ε } := by intros; rfl
toBornology : Bornology α := Bornology.ofDist dist dist_comm dist_triangle
cobounded_sets : (Bornology.cobounded α).sets =
{ s | ∃ C : ℝ, ∀ x ∈ sᶜ, ∀ y ∈ sᶜ, dist x y ≤ C } := by intros; rfl
/-- Two pseudo metric space structures with the same distance function coincide. -/
@[ext]
theorem PseudoMetricSpace.ext {α : Type*} {m m' : PseudoMetricSpace α}
(h : m.toDist = m'.toDist) : m = m' := by
let d := m.toDist
obtain ⟨_, _, _, _, hed, _, hU, _, hB⟩ := m
let d' := m'.toDist
obtain ⟨_, _, _, _, hed', _, hU', _, hB'⟩ := m'
obtain rfl : d = d' := h
congr
· ext x y : 2
rw [hed, hed']
· exact UniformSpace.ext (hU.trans hU'.symm)
· ext : 2
rw [← Filter.mem_sets, ← Filter.mem_sets, hB, hB']
variable [PseudoMetricSpace α]
attribute [instance] PseudoMetricSpace.toUniformSpace PseudoMetricSpace.toBornology
-- see Note [lower instance priority]
instance (priority := 200) PseudoMetricSpace.toEDist : EDist α :=
⟨PseudoMetricSpace.edist⟩
/-- Construct a pseudo-metric space structure whose underlying topological space structure
(definitionally) agrees which a pre-existing topology which is compatible with a given distance
function. -/
def PseudoMetricSpace.ofDistTopology {α : Type u} [TopologicalSpace α] (dist : α → α → ℝ)
(dist_self : ∀ x : α, dist x x = 0) (dist_comm : ∀ x y : α, dist x y = dist y x)
(dist_triangle : ∀ x y z : α, dist x z ≤ dist x y + dist y z)
(H : ∀ s : Set α, IsOpen s ↔ ∀ x ∈ s, ∃ ε > 0, ∀ y, dist x y < ε → y ∈ s) :
PseudoMetricSpace α :=
{ dist := dist
dist_self := dist_self
dist_comm := dist_comm
dist_triangle := dist_triangle
toUniformSpace :=
(UniformSpace.ofDist dist dist_self dist_comm dist_triangle).replaceTopology <|
TopologicalSpace.ext_iff.2 fun s ↦ (H s).trans <| forall₂_congr fun x _ ↦
((UniformSpace.hasBasis_ofFun (exists_gt (0 : ℝ)) dist dist_self dist_comm dist_triangle
UniformSpace.ofDist_aux).comap (Prod.mk x)).mem_iff.symm
uniformity_dist := rfl
toBornology := Bornology.ofDist dist dist_comm dist_triangle
cobounded_sets := rfl }
@[simp]
theorem dist_self (x : α) : dist x x = 0 :=
PseudoMetricSpace.dist_self x
theorem dist_comm (x y : α) : dist x y = dist y x :=
PseudoMetricSpace.dist_comm x y
theorem edist_dist (x y : α) : edist x y = ENNReal.ofReal (dist x y) :=
PseudoMetricSpace.edist_dist x y
@[bound]
theorem dist_triangle (x y z : α) : dist x z ≤ dist x y + dist y z :=
PseudoMetricSpace.dist_triangle x y z
theorem dist_triangle_left (x y z : α) : dist x y ≤ dist z x + dist z y := by
rw [dist_comm z]; apply dist_triangle
theorem dist_triangle_right (x y z : α) : dist x y ≤ dist x z + dist y z := by
rw [dist_comm y]; apply dist_triangle
theorem dist_triangle4 (x y z w : α) : dist x w ≤ dist x y + dist y z + dist z w :=
calc
dist x w ≤ dist x z + dist z w := dist_triangle x z w
_ ≤ dist x y + dist y z + dist z w := add_le_add_right (dist_triangle x y z) _
theorem dist_triangle4_left (x₁ y₁ x₂ y₂ : α) :
dist x₂ y₂ ≤ dist x₁ y₁ + (dist x₁ x₂ + dist y₁ y₂) := by
rw [add_left_comm, dist_comm x₁, ← add_assoc]
apply dist_triangle4
theorem dist_triangle4_right (x₁ y₁ x₂ y₂ : α) :
dist x₁ y₁ ≤ dist x₁ x₂ + dist y₁ y₂ + dist x₂ y₂ := by
rw [add_right_comm, dist_comm y₁]
apply dist_triangle4
theorem dist_triangle8 (a b c d e f g h : α) : dist a h ≤ dist a b + dist b c + dist c d
+ dist d e + dist e f + dist f g + dist g h := by
apply le_trans (dist_triangle4 a f g h)
apply add_le_add_right (add_le_add_right _ (dist f g)) (dist g h)
apply le_trans (dist_triangle4 a d e f)
apply add_le_add_right (add_le_add_right _ (dist d e)) (dist e f)
exact dist_triangle4 a b c d
theorem swap_dist : Function.swap (@dist α _) = dist := by funext x y; exact dist_comm _ _
theorem abs_dist_sub_le (x y z : α) : |dist x z - dist y z| ≤ dist x y :=
abs_sub_le_iff.2
⟨sub_le_iff_le_add.2 (dist_triangle _ _ _), sub_le_iff_le_add.2 (dist_triangle_left _ _ _)⟩
@[bound]
theorem dist_nonneg {x y : α} : 0 ≤ dist x y :=
dist_nonneg' dist dist_self dist_comm dist_triangle
namespace Mathlib.Meta.Positivity
open Lean Meta Qq Function
/-- Extension for the `positivity` tactic: distances are nonnegative. -/
@[positivity Dist.dist _ _]
def evalDist : PositivityExt where eval {u α} _zα _pα e := do
match u, α, e with
| 0, ~q(ℝ), ~q(@Dist.dist $β $inst $a $b) =>
let _inst ← synthInstanceQ q(PseudoMetricSpace $β)
assertInstancesCommute
pure (.nonnegative q(dist_nonneg))
| _, _, _ => throwError "not dist"
end Mathlib.Meta.Positivity
example {x y : α} : 0 ≤ dist x y := by positivity
@[simp] theorem abs_dist {a b : α} : |dist a b| = dist a b := abs_of_nonneg dist_nonneg
/-- A version of `Dist` that takes value in `ℝ≥0`. -/
class NNDist (α : Type*) where
/-- Nonnegative distance between two points -/
nndist : α → α → ℝ≥0
export NNDist (nndist)
-- see Note [lower instance priority]
/-- Distance as a nonnegative real number. -/
instance (priority := 100) PseudoMetricSpace.toNNDist : NNDist α :=
⟨fun a b => ⟨dist a b, dist_nonneg⟩⟩
/-- Express `dist` in terms of `nndist` -/
theorem dist_nndist (x y : α) : dist x y = nndist x y := rfl
@[simp, norm_cast]
theorem coe_nndist (x y : α) : ↑(nndist x y) = dist x y := rfl
/-- Express `edist` in terms of `nndist` -/
theorem edist_nndist (x y : α) : edist x y = nndist x y := by
rw [edist_dist, dist_nndist, ENNReal.ofReal_coe_nnreal]
/-- Express `nndist` in terms of `edist` -/
theorem nndist_edist (x y : α) : nndist x y = (edist x y).toNNReal := by
simp [edist_nndist]
@[simp, norm_cast]
theorem coe_nnreal_ennreal_nndist (x y : α) : ↑(nndist x y) = edist x y :=
(edist_nndist x y).symm
@[simp, norm_cast]
theorem edist_lt_coe {x y : α} {c : ℝ≥0} : edist x y < c ↔ nndist x y < c := by
rw [edist_nndist, ENNReal.coe_lt_coe]
@[simp, norm_cast]
theorem edist_le_coe {x y : α} {c : ℝ≥0} : edist x y ≤ c ↔ nndist x y ≤ c := by
rw [edist_nndist, ENNReal.coe_le_coe]
/-- In a pseudometric space, the extended distance is always finite -/
theorem edist_lt_top {α : Type*} [PseudoMetricSpace α] (x y : α) : edist x y < ⊤ :=
(edist_dist x y).symm ▸ ENNReal.ofReal_lt_top
/-- In a pseudometric space, the extended distance is always finite -/
theorem edist_ne_top (x y : α) : edist x y ≠ ⊤ :=
(edist_lt_top x y).ne
/-- `nndist x x` vanishes -/
@[simp] theorem nndist_self (a : α) : nndist a a = 0 := NNReal.coe_eq_zero.1 (dist_self a)
@[simp, norm_cast]
theorem dist_lt_coe {x y : α} {c : ℝ≥0} : dist x y < c ↔ nndist x y < c :=
Iff.rfl
@[simp, norm_cast]
theorem dist_le_coe {x y : α} {c : ℝ≥0} : dist x y ≤ c ↔ nndist x y ≤ c :=
Iff.rfl
@[simp]
theorem edist_lt_ofReal {x y : α} {r : ℝ} : edist x y < ENNReal.ofReal r ↔ dist x y < r := by
rw [edist_dist, ENNReal.ofReal_lt_ofReal_iff_of_nonneg dist_nonneg]
@[simp]
theorem edist_le_ofReal {x y : α} {r : ℝ} (hr : 0 ≤ r) :
edist x y ≤ ENNReal.ofReal r ↔ dist x y ≤ r := by
rw [edist_dist, ENNReal.ofReal_le_ofReal_iff hr]
/-- Express `nndist` in terms of `dist` -/
theorem nndist_dist (x y : α) : nndist x y = Real.toNNReal (dist x y) := by
rw [dist_nndist, Real.toNNReal_coe]
theorem nndist_comm (x y : α) : nndist x y = nndist y x := NNReal.eq <| dist_comm x y
/-- Triangle inequality for the nonnegative distance -/
theorem nndist_triangle (x y z : α) : nndist x z ≤ nndist x y + nndist y z :=
dist_triangle _ _ _
theorem nndist_triangle_left (x y z : α) : nndist x y ≤ nndist z x + nndist z y :=
dist_triangle_left _ _ _
theorem nndist_triangle_right (x y z : α) : nndist x y ≤ nndist x z + nndist y z :=
dist_triangle_right _ _ _
/-- Express `dist` in terms of `edist` -/
theorem dist_edist (x y : α) : dist x y = (edist x y).toReal := by
rw [edist_dist, ENNReal.toReal_ofReal dist_nonneg]
namespace Metric
-- instantiate pseudometric space as a topology
variable {x y z : α} {δ ε ε₁ ε₂ : ℝ} {s : Set α}
/-- `ball x ε` is the set of all points `y` with `dist y x < ε` -/
def ball (x : α) (ε : ℝ) : Set α :=
{ y | dist y x < ε }
@[simp]
theorem mem_ball : y ∈ ball x ε ↔ dist y x < ε :=
Iff.rfl
theorem mem_ball' : y ∈ ball x ε ↔ dist x y < ε := by rw [dist_comm, mem_ball]
theorem pos_of_mem_ball (hy : y ∈ ball x ε) : 0 < ε :=
dist_nonneg.trans_lt hy
theorem mem_ball_self (h : 0 < ε) : x ∈ ball x ε := by
rwa [mem_ball, dist_self]
@[simp]
theorem nonempty_ball : (ball x ε).Nonempty ↔ 0 < ε :=
⟨fun ⟨_x, hx⟩ => pos_of_mem_ball hx, fun h => ⟨x, mem_ball_self h⟩⟩
@[simp]
theorem ball_eq_empty : ball x ε = ∅ ↔ ε ≤ 0 := by
rw [← not_nonempty_iff_eq_empty, nonempty_ball, not_lt]
@[simp]
theorem ball_zero : ball x 0 = ∅ := by rw [ball_eq_empty]
/-- If a point belongs to an open ball, then there is a strictly smaller radius whose ball also
contains it.
See also `exists_lt_subset_ball`. -/
theorem exists_lt_mem_ball_of_mem_ball (h : x ∈ ball y ε) : ∃ ε' < ε, x ∈ ball y ε' := by
simp only [mem_ball] at h ⊢
exact ⟨(dist x y + ε) / 2, by linarith, by linarith⟩
theorem ball_eq_ball (ε : ℝ) (x : α) :
UniformSpace.ball x { p | dist p.2 p.1 < ε } = Metric.ball x ε :=
rfl
theorem ball_eq_ball' (ε : ℝ) (x : α) :
UniformSpace.ball x { p | dist p.1 p.2 < ε } = Metric.ball x ε := by
ext
simp [dist_comm, UniformSpace.ball]
@[simp]
theorem iUnion_ball_nat (x : α) : ⋃ n : ℕ, ball x n = univ :=
iUnion_eq_univ_iff.2 fun y => exists_nat_gt (dist y x)
@[simp]
theorem iUnion_ball_nat_succ (x : α) : ⋃ n : ℕ, ball x (n + 1) = univ :=
iUnion_eq_univ_iff.2 fun y => (exists_nat_gt (dist y x)).imp fun _ h => h.trans (lt_add_one _)
/-- `closedBall x ε` is the set of all points `y` with `dist y x ≤ ε` -/
def closedBall (x : α) (ε : ℝ) :=
{ y | dist y x ≤ ε }
@[simp] theorem mem_closedBall : y ∈ closedBall x ε ↔ dist y x ≤ ε := Iff.rfl
theorem mem_closedBall' : y ∈ closedBall x ε ↔ dist x y ≤ ε := by rw [dist_comm, mem_closedBall]
/-- `sphere x ε` is the set of all points `y` with `dist y x = ε` -/
def sphere (x : α) (ε : ℝ) := { y | dist y x = ε }
@[simp] theorem mem_sphere : y ∈ sphere x ε ↔ dist y x = ε := Iff.rfl
theorem mem_sphere' : y ∈ sphere x ε ↔ dist x y = ε := by rw [dist_comm, mem_sphere]
theorem ne_of_mem_sphere (h : y ∈ sphere x ε) (hε : ε ≠ 0) : y ≠ x :=
ne_of_mem_of_not_mem h <| by simpa using hε.symm
theorem nonneg_of_mem_sphere (hy : y ∈ sphere x ε) : 0 ≤ ε :=
dist_nonneg.trans_eq hy
@[simp]
theorem sphere_eq_empty_of_neg (hε : ε < 0) : sphere x ε = ∅ :=
Set.eq_empty_iff_forall_not_mem.mpr fun _y hy => (nonneg_of_mem_sphere hy).not_lt hε
theorem sphere_eq_empty_of_subsingleton [Subsingleton α] (hε : ε ≠ 0) : sphere x ε = ∅ :=
Set.eq_empty_iff_forall_not_mem.mpr fun _ h => ne_of_mem_sphere h hε (Subsingleton.elim _ _)
instance sphere_isEmpty_of_subsingleton [Subsingleton α] [NeZero ε] : IsEmpty (sphere x ε) := by
rw [sphere_eq_empty_of_subsingleton (NeZero.ne ε)]; infer_instance
theorem closedBall_eq_singleton_of_subsingleton [Subsingleton α] (h : 0 ≤ ε) :
closedBall x ε = {x} := by
ext x'
simpa [Subsingleton.allEq x x']
theorem ball_eq_singleton_of_subsingleton [Subsingleton α] (h : 0 < ε) : ball x ε = {x} := by
ext x'
simpa [Subsingleton.allEq x x']
theorem mem_closedBall_self (h : 0 ≤ ε) : x ∈ closedBall x ε := by
rwa [mem_closedBall, dist_self]
@[simp]
theorem nonempty_closedBall : (closedBall x ε).Nonempty ↔ 0 ≤ ε :=
⟨fun ⟨_x, hx⟩ => dist_nonneg.trans hx, fun h => ⟨x, mem_closedBall_self h⟩⟩
@[simp]
theorem closedBall_eq_empty : closedBall x ε = ∅ ↔ ε < 0 := by
rw [← not_nonempty_iff_eq_empty, nonempty_closedBall, not_le]
/-- Closed balls and spheres coincide when the radius is non-positive -/
theorem closedBall_eq_sphere_of_nonpos (hε : ε ≤ 0) : closedBall x ε = sphere x ε :=
Set.ext fun _ => (hε.trans dist_nonneg).le_iff_eq
theorem ball_subset_closedBall : ball x ε ⊆ closedBall x ε := fun _y hy =>
mem_closedBall.2 (le_of_lt hy)
theorem sphere_subset_closedBall : sphere x ε ⊆ closedBall x ε := fun _ => le_of_eq
lemma sphere_subset_ball {r R : ℝ} (h : r < R) : sphere x r ⊆ ball x R := fun _x hx ↦
(mem_sphere.1 hx).trans_lt h
theorem closedBall_disjoint_ball (h : δ + ε ≤ dist x y) : Disjoint (closedBall x δ) (ball y ε) :=
Set.disjoint_left.mpr fun _a ha1 ha2 =>
(h.trans <| dist_triangle_left _ _ _).not_lt <| add_lt_add_of_le_of_lt ha1 ha2
theorem ball_disjoint_closedBall (h : δ + ε ≤ dist x y) : Disjoint (ball x δ) (closedBall y ε) :=
(closedBall_disjoint_ball <| by rwa [add_comm, dist_comm]).symm
theorem ball_disjoint_ball (h : δ + ε ≤ dist x y) : Disjoint (ball x δ) (ball y ε) :=
(closedBall_disjoint_ball h).mono_left ball_subset_closedBall
theorem closedBall_disjoint_closedBall (h : δ + ε < dist x y) :
Disjoint (closedBall x δ) (closedBall y ε) :=
Set.disjoint_left.mpr fun _a ha1 ha2 =>
h.not_le <| (dist_triangle_left _ _ _).trans <| add_le_add ha1 ha2
theorem sphere_disjoint_ball : Disjoint (sphere x ε) (ball x ε) :=
Set.disjoint_left.mpr fun _y hy₁ hy₂ => absurd hy₁ <| ne_of_lt hy₂
@[simp]
theorem ball_union_sphere : ball x ε ∪ sphere x ε = closedBall x ε :=
Set.ext fun _y => (@le_iff_lt_or_eq ℝ _ _ _).symm
@[simp]
theorem sphere_union_ball : sphere x ε ∪ ball x ε = closedBall x ε := by
rw [union_comm, ball_union_sphere]
@[simp]
theorem closedBall_diff_sphere : closedBall x ε \ sphere x ε = ball x ε := by
rw [← ball_union_sphere, Set.union_diff_cancel_right sphere_disjoint_ball.symm.le_bot]
@[simp]
theorem closedBall_diff_ball : closedBall x ε \ ball x ε = sphere x ε := by
rw [← ball_union_sphere, Set.union_diff_cancel_left sphere_disjoint_ball.symm.le_bot]
theorem mem_ball_comm : x ∈ ball y ε ↔ y ∈ ball x ε := by rw [mem_ball', mem_ball]
theorem mem_closedBall_comm : x ∈ closedBall y ε ↔ y ∈ closedBall x ε := by
rw [mem_closedBall', mem_closedBall]
theorem mem_sphere_comm : x ∈ sphere y ε ↔ y ∈ sphere x ε := by rw [mem_sphere', mem_sphere]
@[gcongr]
theorem ball_subset_ball (h : ε₁ ≤ ε₂) : ball x ε₁ ⊆ ball x ε₂ := fun _y yx =>
lt_of_lt_of_le (mem_ball.1 yx) h
theorem closedBall_eq_bInter_ball : closedBall x ε = ⋂ δ > ε, ball x δ := by
ext y; rw [mem_closedBall, ← forall_lt_iff_le', mem_iInter₂]; rfl
theorem ball_subset_ball' (h : ε₁ + dist x y ≤ ε₂) : ball x ε₁ ⊆ ball y ε₂ := fun z hz =>
calc
dist z y ≤ dist z x + dist x y := dist_triangle _ _ _
_ < ε₁ + dist x y := add_lt_add_right (mem_ball.1 hz) _
_ ≤ ε₂ := h
@[gcongr]
theorem closedBall_subset_closedBall (h : ε₁ ≤ ε₂) : closedBall x ε₁ ⊆ closedBall x ε₂ :=
fun _y (yx : _ ≤ ε₁) => le_trans yx h
theorem closedBall_subset_closedBall' (h : ε₁ + dist x y ≤ ε₂) :
closedBall x ε₁ ⊆ closedBall y ε₂ := fun z hz =>
calc
dist z y ≤ dist z x + dist x y := dist_triangle _ _ _
_ ≤ ε₁ + dist x y := add_le_add_right (mem_closedBall.1 hz) _
_ ≤ ε₂ := h
theorem closedBall_subset_ball (h : ε₁ < ε₂) : closedBall x ε₁ ⊆ ball x ε₂ :=
fun y (yh : dist y x ≤ ε₁) => lt_of_le_of_lt yh h
theorem closedBall_subset_ball' (h : ε₁ + dist x y < ε₂) :
closedBall x ε₁ ⊆ ball y ε₂ := fun z hz =>
calc
dist z y ≤ dist z x + dist x y := dist_triangle _ _ _
_ ≤ ε₁ + dist x y := add_le_add_right (mem_closedBall.1 hz) _
_ < ε₂ := h
theorem dist_le_add_of_nonempty_closedBall_inter_closedBall
(h : (closedBall x ε₁ ∩ closedBall y ε₂).Nonempty) : dist x y ≤ ε₁ + ε₂ :=
let ⟨z, hz⟩ := h
calc
dist x y ≤ dist z x + dist z y := dist_triangle_left _ _ _
_ ≤ ε₁ + ε₂ := add_le_add hz.1 hz.2
theorem dist_lt_add_of_nonempty_closedBall_inter_ball (h : (closedBall x ε₁ ∩ ball y ε₂).Nonempty) :
dist x y < ε₁ + ε₂ :=
let ⟨z, hz⟩ := h
calc
dist x y ≤ dist z x + dist z y := dist_triangle_left _ _ _
_ < ε₁ + ε₂ := add_lt_add_of_le_of_lt hz.1 hz.2
theorem dist_lt_add_of_nonempty_ball_inter_closedBall (h : (ball x ε₁ ∩ closedBall y ε₂).Nonempty) :
dist x y < ε₁ + ε₂ := by
rw [inter_comm] at h
rw [add_comm, dist_comm]
exact dist_lt_add_of_nonempty_closedBall_inter_ball h
theorem dist_lt_add_of_nonempty_ball_inter_ball (h : (ball x ε₁ ∩ ball y ε₂).Nonempty) :
dist x y < ε₁ + ε₂ :=
dist_lt_add_of_nonempty_closedBall_inter_ball <|
h.mono (inter_subset_inter ball_subset_closedBall Subset.rfl)
@[simp]
theorem iUnion_closedBall_nat (x : α) : ⋃ n : ℕ, closedBall x n = univ :=
iUnion_eq_univ_iff.2 fun y => exists_nat_ge (dist y x)
theorem iUnion_inter_closedBall_nat (s : Set α) (x : α) : ⋃ n : ℕ, s ∩ closedBall x n = s := by
rw [← inter_iUnion, iUnion_closedBall_nat, inter_univ]
theorem ball_subset (h : dist x y ≤ ε₂ - ε₁) : ball x ε₁ ⊆ ball y ε₂ := fun z zx => by
rw [← add_sub_cancel ε₁ ε₂]
exact lt_of_le_of_lt (dist_triangle z x y) (add_lt_add_of_lt_of_le zx h)
theorem ball_half_subset (y) (h : y ∈ ball x (ε / 2)) : ball y (ε / 2) ⊆ ball x ε :=
ball_subset <| by rw [sub_self_div_two]; exact le_of_lt h
theorem exists_ball_subset_ball (h : y ∈ ball x ε) : ∃ ε' > 0, ball y ε' ⊆ ball x ε :=
⟨_, sub_pos.2 h, ball_subset <| by rw [sub_sub_self]⟩
/-- If a property holds for all points in closed balls of arbitrarily large radii, then it holds for
all points. -/
theorem forall_of_forall_mem_closedBall (p : α → Prop) (x : α)
(H : ∃ᶠ R : ℝ in atTop, ∀ y ∈ closedBall x R, p y) (y : α) : p y := by
obtain ⟨R, hR, h⟩ : ∃ R ≥ dist y x, ∀ z : α, z ∈ closedBall x R → p z :=
frequently_iff.1 H (Ici_mem_atTop (dist y x))
exact h _ hR
/-- If a property holds for all points in balls of arbitrarily large radii, then it holds for all
points. -/
theorem forall_of_forall_mem_ball (p : α → Prop) (x : α)
(H : ∃ᶠ R : ℝ in atTop, ∀ y ∈ ball x R, p y) (y : α) : p y := by
obtain ⟨R, hR, h⟩ : ∃ R > dist y x, ∀ z : α, z ∈ ball x R → p z :=
frequently_iff.1 H (Ioi_mem_atTop (dist y x))
exact h _ hR
theorem isBounded_iff {s : Set α} :
IsBounded s ↔ ∃ C : ℝ, ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → dist x y ≤ C := by
rw [isBounded_def, ← Filter.mem_sets, @PseudoMetricSpace.cobounded_sets α, mem_setOf_eq,
compl_compl]
theorem isBounded_iff_eventually {s : Set α} :
IsBounded s ↔ ∀ᶠ C in atTop, ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → dist x y ≤ C :=
isBounded_iff.trans
⟨fun ⟨C, h⟩ => eventually_atTop.2 ⟨C, fun _C' hC' _x hx _y hy => (h hx hy).trans hC'⟩,
Eventually.exists⟩
theorem isBounded_iff_exists_ge {s : Set α} (c : ℝ) :
IsBounded s ↔ ∃ C, c ≤ C ∧ ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → dist x y ≤ C :=
⟨fun h => ((eventually_ge_atTop c).and (isBounded_iff_eventually.1 h)).exists, fun h =>
isBounded_iff.2 <| h.imp fun _ => And.right⟩
theorem isBounded_iff_nndist {s : Set α} :
IsBounded s ↔ ∃ C : ℝ≥0, ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → nndist x y ≤ C := by
simp only [isBounded_iff_exists_ge 0, NNReal.exists, ← NNReal.coe_le_coe, ← dist_nndist,
NNReal.coe_mk, exists_prop]
theorem toUniformSpace_eq :
‹PseudoMetricSpace α›.toUniformSpace = .ofDist dist dist_self dist_comm dist_triangle :=
UniformSpace.ext PseudoMetricSpace.uniformity_dist
theorem uniformity_basis_dist :
(𝓤 α).HasBasis (fun ε : ℝ => 0 < ε) fun ε => { p : α × α | dist p.1 p.2 < ε } := by
rw [toUniformSpace_eq]
exact UniformSpace.hasBasis_ofFun (exists_gt _) _ _ _ _ _
/-- Given `f : β → ℝ`, if `f` sends `{i | p i}` to a set of positive numbers
accumulating to zero, then `f i`-neighborhoods of the diagonal form a basis of `𝓤 α`.
For specific bases see `uniformity_basis_dist`, `uniformity_basis_dist_inv_nat_succ`,
and `uniformity_basis_dist_inv_nat_pos`. -/
protected theorem mk_uniformity_basis {β : Type*} {p : β → Prop} {f : β → ℝ}
(hf₀ : ∀ i, p i → 0 < f i) (hf : ∀ ⦃ε⦄, 0 < ε → ∃ i, p i ∧ f i ≤ ε) :
(𝓤 α).HasBasis p fun i => { p : α × α | dist p.1 p.2 < f i } := by
refine ⟨fun s => uniformity_basis_dist.mem_iff.trans ?_⟩
constructor
· rintro ⟨ε, ε₀, hε⟩
rcases hf ε₀ with ⟨i, hi, H⟩
exact ⟨i, hi, fun x (hx : _ < _) => hε <| lt_of_lt_of_le hx H⟩
· exact fun ⟨i, hi, H⟩ => ⟨f i, hf₀ i hi, H⟩
theorem uniformity_basis_dist_rat :
(𝓤 α).HasBasis (fun r : ℚ => 0 < r) fun r => { p : α × α | dist p.1 p.2 < r } :=
Metric.mk_uniformity_basis (fun _ => Rat.cast_pos.2) fun _ε hε =>
let ⟨r, hr0, hrε⟩ := exists_rat_btwn hε
⟨r, Rat.cast_pos.1 hr0, hrε.le⟩
theorem uniformity_basis_dist_inv_nat_succ :
(𝓤 α).HasBasis (fun _ => True) fun n : ℕ => { p : α × α | dist p.1 p.2 < 1 / (↑n + 1) } :=
Metric.mk_uniformity_basis (fun n _ => div_pos zero_lt_one <| Nat.cast_add_one_pos n) fun _ε ε0 =>
(exists_nat_one_div_lt ε0).imp fun _n hn => ⟨trivial, le_of_lt hn⟩
theorem uniformity_basis_dist_inv_nat_pos :
(𝓤 α).HasBasis (fun n : ℕ => 0 < n) fun n : ℕ => { p : α × α | dist p.1 p.2 < 1 / ↑n } :=
Metric.mk_uniformity_basis (fun _ hn => div_pos zero_lt_one <| Nat.cast_pos.2 hn) fun _ ε0 =>
let ⟨n, hn⟩ := exists_nat_one_div_lt ε0
⟨n + 1, Nat.succ_pos n, mod_cast hn.le⟩
theorem uniformity_basis_dist_pow {r : ℝ} (h0 : 0 < r) (h1 : r < 1) :
(𝓤 α).HasBasis (fun _ : ℕ => True) fun n : ℕ => { p : α × α | dist p.1 p.2 < r ^ n } :=
Metric.mk_uniformity_basis (fun _ _ => pow_pos h0 _) fun _ε ε0 =>
let ⟨n, hn⟩ := exists_pow_lt_of_lt_one ε0 h1
⟨n, trivial, hn.le⟩
theorem uniformity_basis_dist_lt {R : ℝ} (hR : 0 < R) :
(𝓤 α).HasBasis (fun r : ℝ => 0 < r ∧ r < R) fun r => { p : α × α | dist p.1 p.2 < r } :=
Metric.mk_uniformity_basis (fun _ => And.left) fun r hr =>
⟨min r (R / 2), ⟨lt_min hr (half_pos hR), min_lt_iff.2 <| Or.inr (half_lt_self hR)⟩,
min_le_left _ _⟩
/-- Given `f : β → ℝ`, if `f` sends `{i | p i}` to a set of positive numbers
accumulating to zero, then closed neighborhoods of the diagonal of sizes `{f i | p i}`
form a basis of `𝓤 α`.
Currently we have only one specific basis `uniformity_basis_dist_le` based on this constructor.
More can be easily added if needed in the future. -/
protected theorem mk_uniformity_basis_le {β : Type*} {p : β → Prop} {f : β → ℝ}
(hf₀ : ∀ x, p x → 0 < f x) (hf : ∀ ε, 0 < ε → ∃ x, p x ∧ f x ≤ ε) :
(𝓤 α).HasBasis p fun x => { p : α × α | dist p.1 p.2 ≤ f x } := by
refine ⟨fun s => uniformity_basis_dist.mem_iff.trans ?_⟩
constructor
· rintro ⟨ε, ε₀, hε⟩
rcases exists_between ε₀ with ⟨ε', hε'⟩
rcases hf ε' hε'.1 with ⟨i, hi, H⟩
exact ⟨i, hi, fun x (hx : _ ≤ _) => hε <| lt_of_le_of_lt (le_trans hx H) hε'.2⟩
· exact fun ⟨i, hi, H⟩ => ⟨f i, hf₀ i hi, fun x (hx : _ < _) => H (mem_setOf.2 hx.le)⟩
/-- Constant size closed neighborhoods of the diagonal form a basis
of the uniformity filter. -/
theorem uniformity_basis_dist_le :
(𝓤 α).HasBasis ((0 : ℝ) < ·) fun ε => { p : α × α | dist p.1 p.2 ≤ ε } :=
Metric.mk_uniformity_basis_le (fun _ => id) fun ε ε₀ => ⟨ε, ε₀, le_refl ε⟩
theorem uniformity_basis_dist_le_pow {r : ℝ} (h0 : 0 < r) (h1 : r < 1) :
(𝓤 α).HasBasis (fun _ : ℕ => True) fun n : ℕ => { p : α × α | dist p.1 p.2 ≤ r ^ n } :=
Metric.mk_uniformity_basis_le (fun _ _ => pow_pos h0 _) fun _ε ε0 =>
let ⟨n, hn⟩ := exists_pow_lt_of_lt_one ε0 h1
⟨n, trivial, hn.le⟩
theorem mem_uniformity_dist {s : Set (α × α)} :
s ∈ 𝓤 α ↔ ∃ ε > 0, ∀ ⦃a b : α⦄, dist a b < ε → (a, b) ∈ s :=
uniformity_basis_dist.mem_uniformity_iff
/-- A constant size neighborhood of the diagonal is an entourage. -/
theorem dist_mem_uniformity {ε : ℝ} (ε0 : 0 < ε) : { p : α × α | dist p.1 p.2 < ε } ∈ 𝓤 α :=
mem_uniformity_dist.2 ⟨ε, ε0, fun _ _ ↦ id⟩
theorem uniformContinuous_iff [PseudoMetricSpace β] {f : α → β} :
UniformContinuous f ↔ ∀ ε > 0, ∃ δ > 0, ∀ ⦃a b : α⦄, dist a b < δ → dist (f a) (f b) < ε :=
uniformity_basis_dist.uniformContinuous_iff uniformity_basis_dist
theorem uniformContinuousOn_iff [PseudoMetricSpace β] {f : α → β} {s : Set α} :
UniformContinuousOn f s ↔
∀ ε > 0, ∃ δ > 0, ∀ x ∈ s, ∀ y ∈ s, dist x y < δ → dist (f x) (f y) < ε :=
Metric.uniformity_basis_dist.uniformContinuousOn_iff Metric.uniformity_basis_dist
theorem uniformContinuousOn_iff_le [PseudoMetricSpace β] {f : α → β} {s : Set α} :
UniformContinuousOn f s ↔
∀ ε > 0, ∃ δ > 0, ∀ x ∈ s, ∀ y ∈ s, dist x y ≤ δ → dist (f x) (f y) ≤ ε :=
Metric.uniformity_basis_dist_le.uniformContinuousOn_iff Metric.uniformity_basis_dist_le
theorem nhds_basis_ball : (𝓝 x).HasBasis (0 < ·) (ball x) :=
nhds_basis_uniformity uniformity_basis_dist
theorem mem_nhds_iff : s ∈ 𝓝 x ↔ ∃ ε > 0, ball x ε ⊆ s :=
nhds_basis_ball.mem_iff
theorem eventually_nhds_iff {p : α → Prop} :
(∀ᶠ y in 𝓝 x, p y) ↔ ∃ ε > 0, ∀ ⦃y⦄, dist y x < ε → p y :=
mem_nhds_iff
theorem eventually_nhds_iff_ball {p : α → Prop} :
(∀ᶠ y in 𝓝 x, p y) ↔ ∃ ε > 0, ∀ y ∈ ball x ε, p y :=
mem_nhds_iff
/-- A version of `Filter.eventually_prod_iff` where the first filter consists of neighborhoods
in a pseudo-metric space. -/
theorem eventually_nhds_prod_iff {f : Filter ι} {x₀ : α} {p : α × ι → Prop} :
(∀ᶠ x in 𝓝 x₀ ×ˢ f, p x) ↔ ∃ ε > (0 : ℝ), ∃ pa : ι → Prop, (∀ᶠ i in f, pa i) ∧
∀ ⦃x⦄, dist x x₀ < ε → ∀ ⦃i⦄, pa i → p (x, i) := by
refine (nhds_basis_ball.prod f.basis_sets).eventually_iff.trans ?_
simp only [Prod.exists, forall_prod_set, id, mem_ball, and_assoc, exists_and_left, and_imp]
rfl
/-- A version of `Filter.eventually_prod_iff` where the second filter consists of neighborhoods
in a pseudo-metric space. -/
theorem eventually_prod_nhds_iff {f : Filter ι} {x₀ : α} {p : ι × α → Prop} :
(∀ᶠ x in f ×ˢ 𝓝 x₀, p x) ↔ ∃ pa : ι → Prop, (∀ᶠ i in f, pa i) ∧
∃ ε > 0, ∀ ⦃i⦄, pa i → ∀ ⦃x⦄, dist x x₀ < ε → p (i, x) := by
rw [eventually_swap_iff, Metric.eventually_nhds_prod_iff]
constructor <;>
· rintro ⟨a1, a2, a3, a4, a5⟩
exact ⟨a3, a4, a1, a2, fun _ b1 b2 b3 => a5 b3 b1⟩
theorem nhds_basis_closedBall : (𝓝 x).HasBasis (fun ε : ℝ => 0 < ε) (closedBall x) :=
nhds_basis_uniformity uniformity_basis_dist_le
theorem nhds_basis_ball_inv_nat_succ :
(𝓝 x).HasBasis (fun _ => True) fun n : ℕ => ball x (1 / (↑n + 1)) :=
nhds_basis_uniformity uniformity_basis_dist_inv_nat_succ
theorem nhds_basis_ball_inv_nat_pos :
(𝓝 x).HasBasis (fun n => 0 < n) fun n : ℕ => ball x (1 / ↑n) :=
nhds_basis_uniformity uniformity_basis_dist_inv_nat_pos
theorem nhds_basis_ball_pow {r : ℝ} (h0 : 0 < r) (h1 : r < 1) :
(𝓝 x).HasBasis (fun _ => True) fun n : ℕ => ball x (r ^ n) :=
nhds_basis_uniformity (uniformity_basis_dist_pow h0 h1)
theorem nhds_basis_closedBall_pow {r : ℝ} (h0 : 0 < r) (h1 : r < 1) :
(𝓝 x).HasBasis (fun _ => True) fun n : ℕ => closedBall x (r ^ n) :=
nhds_basis_uniformity (uniformity_basis_dist_le_pow h0 h1)
theorem isOpen_iff : IsOpen s ↔ ∀ x ∈ s, ∃ ε > 0, ball x ε ⊆ s := by
simp only [isOpen_iff_mem_nhds, mem_nhds_iff]
@[simp] theorem isOpen_ball : IsOpen (ball x ε) :=
isOpen_iff.2 fun _ => exists_ball_subset_ball
theorem ball_mem_nhds (x : α) {ε : ℝ} (ε0 : 0 < ε) : ball x ε ∈ 𝓝 x :=
isOpen_ball.mem_nhds (mem_ball_self ε0)
theorem closedBall_mem_nhds (x : α) {ε : ℝ} (ε0 : 0 < ε) : closedBall x ε ∈ 𝓝 x :=
mem_of_superset (ball_mem_nhds x ε0) ball_subset_closedBall
theorem closedBall_mem_nhds_of_mem {x c : α} {ε : ℝ} (h : x ∈ ball c ε) : closedBall c ε ∈ 𝓝 x :=
mem_of_superset (isOpen_ball.mem_nhds h) ball_subset_closedBall
theorem nhdsWithin_basis_ball {s : Set α} :
(𝓝[s] x).HasBasis (fun ε : ℝ => 0 < ε) fun ε => ball x ε ∩ s :=
nhdsWithin_hasBasis nhds_basis_ball s
theorem mem_nhdsWithin_iff {t : Set α} : s ∈ 𝓝[t] x ↔ ∃ ε > 0, ball x ε ∩ t ⊆ s :=
nhdsWithin_basis_ball.mem_iff
theorem tendsto_nhdsWithin_nhdsWithin [PseudoMetricSpace β] {t : Set β} {f : α → β} {a b} :
Tendsto f (𝓝[s] a) (𝓝[t] b) ↔
∀ ε > 0, ∃ δ > 0, ∀ ⦃x : α⦄, x ∈ s → dist x a < δ → f x ∈ t ∧ dist (f x) b < ε :=
(nhdsWithin_basis_ball.tendsto_iff nhdsWithin_basis_ball).trans <| by
simp only [inter_comm _ s, inter_comm _ t, mem_inter_iff, and_imp, gt_iff_lt, mem_ball]
theorem tendsto_nhdsWithin_nhds [PseudoMetricSpace β] {f : α → β} {a b} :
Tendsto f (𝓝[s] a) (𝓝 b) ↔
∀ ε > 0, ∃ δ > 0, ∀ ⦃x : α⦄, x ∈ s → dist x a < δ → dist (f x) b < ε := by
rw [← nhdsWithin_univ b, tendsto_nhdsWithin_nhdsWithin]
simp only [mem_univ, true_and]
theorem tendsto_nhds_nhds [PseudoMetricSpace β] {f : α → β} {a b} :
Tendsto f (𝓝 a) (𝓝 b) ↔ ∀ ε > 0, ∃ δ > 0, ∀ ⦃x : α⦄, dist x a < δ → dist (f x) b < ε :=
nhds_basis_ball.tendsto_iff nhds_basis_ball
theorem continuousAt_iff [PseudoMetricSpace β] {f : α → β} {a : α} :
ContinuousAt f a ↔ ∀ ε > 0, ∃ δ > 0, ∀ ⦃x : α⦄, dist x a < δ → dist (f x) (f a) < ε := by
rw [ContinuousAt, tendsto_nhds_nhds]
theorem continuousWithinAt_iff [PseudoMetricSpace β] {f : α → β} {a : α} {s : Set α} :
ContinuousWithinAt f s a ↔
∀ ε > 0, ∃ δ > 0, ∀ ⦃x : α⦄, x ∈ s → dist x a < δ → dist (f x) (f a) < ε := by
rw [ContinuousWithinAt, tendsto_nhdsWithin_nhds]
theorem continuousOn_iff [PseudoMetricSpace β] {f : α → β} {s : Set α} :
ContinuousOn f s ↔ ∀ b ∈ s, ∀ ε > 0, ∃ δ > 0, ∀ a ∈ s, dist a b < δ → dist (f a) (f b) < ε := by
simp [ContinuousOn, continuousWithinAt_iff]
theorem continuous_iff [PseudoMetricSpace β] {f : α → β} :
Continuous f ↔ ∀ b, ∀ ε > 0, ∃ δ > 0, ∀ a, dist a b < δ → dist (f a) (f b) < ε :=
continuous_iff_continuousAt.trans <| forall_congr' fun _ => tendsto_nhds_nhds
theorem tendsto_nhds {f : Filter β} {u : β → α} {a : α} :
Tendsto u f (𝓝 a) ↔ ∀ ε > 0, ∀ᶠ x in f, dist (u x) a < ε :=
nhds_basis_ball.tendsto_right_iff
theorem continuousAt_iff' [TopologicalSpace β] {f : β → α} {b : β} :
ContinuousAt f b ↔ ∀ ε > 0, ∀ᶠ x in 𝓝 b, dist (f x) (f b) < ε := by
rw [ContinuousAt, tendsto_nhds]
theorem continuousWithinAt_iff' [TopologicalSpace β] {f : β → α} {b : β} {s : Set β} :
ContinuousWithinAt f s b ↔ ∀ ε > 0, ∀ᶠ x in 𝓝[s] b, dist (f x) (f b) < ε := by
rw [ContinuousWithinAt, tendsto_nhds]
theorem continuousOn_iff' [TopologicalSpace β] {f : β → α} {s : Set β} :
ContinuousOn f s ↔ ∀ b ∈ s, ∀ ε > 0, ∀ᶠ x in 𝓝[s] b, dist (f x) (f b) < ε := by
simp [ContinuousOn, continuousWithinAt_iff']
theorem continuous_iff' [TopologicalSpace β] {f : β → α} :
Continuous f ↔ ∀ (a), ∀ ε > 0, ∀ᶠ x in 𝓝 a, dist (f x) (f a) < ε :=
continuous_iff_continuousAt.trans <| forall_congr' fun _ => tendsto_nhds
theorem tendsto_atTop [Nonempty β] [SemilatticeSup β] {u : β → α} {a : α} :
Tendsto u atTop (𝓝 a) ↔ ∀ ε > 0, ∃ N, ∀ n ≥ N, dist (u n) a < ε :=
(atTop_basis.tendsto_iff nhds_basis_ball).trans <| by
simp only [true_and, mem_ball, mem_Ici]
/-- A variant of `tendsto_atTop` that
uses `∃ N, ∀ n > N, ...` rather than `∃ N, ∀ n ≥ N, ...`
-/
theorem tendsto_atTop' [Nonempty β] [SemilatticeSup β] [NoMaxOrder β] {u : β → α} {a : α} :
Tendsto u atTop (𝓝 a) ↔ ∀ ε > 0, ∃ N, ∀ n > N, dist (u n) a < ε :=
(atTop_basis_Ioi.tendsto_iff nhds_basis_ball).trans <| by
simp only [true_and, gt_iff_lt, mem_Ioi, mem_ball]
theorem isOpen_singleton_iff {α : Type*} [PseudoMetricSpace α] {x : α} :
IsOpen ({x} : Set α) ↔ ∃ ε > 0, ∀ y, dist y x < ε → y = x := by
simp [isOpen_iff, subset_singleton_iff, mem_ball]
theorem _root_.Dense.exists_dist_lt {s : Set α} (hs : Dense s) (x : α) {ε : ℝ} (hε : 0 < ε) :
∃ y ∈ s, dist x y < ε := by
have : (ball x ε).Nonempty := by simp [hε]
simpa only [mem_ball'] using hs.exists_mem_open isOpen_ball this
nonrec theorem _root_.DenseRange.exists_dist_lt {β : Type*} {f : β → α} (hf : DenseRange f) (x : α)
{ε : ℝ} (hε : 0 < ε) : ∃ y, dist x (f y) < ε :=
exists_range_iff.1 (hf.exists_dist_lt x hε)
/-- (Pseudo) metric space has discrete `UniformSpace` structure
iff the distances between distinct points are uniformly bounded away from zero. -/
protected lemma uniformSpace_eq_bot :
‹PseudoMetricSpace α›.toUniformSpace = ⊥ ↔
∃ r : ℝ, 0 < r ∧ Pairwise (r ≤ dist · · : α → α → Prop) := by
simp only [uniformity_basis_dist.uniformSpace_eq_bot, mem_setOf_eq, not_lt]
end Metric
open Metric
/-- If the distances between distinct points in a (pseudo) metric space
are uniformly bounded away from zero, then the space has discrete topology. -/
lemma DiscreteTopology.of_forall_le_dist {α} [PseudoMetricSpace α] {r : ℝ} (hpos : 0 < r)
(hr : Pairwise (r ≤ dist · · : α → α → Prop)) : DiscreteTopology α :=
⟨by rw [Metric.uniformSpace_eq_bot.2 ⟨r, hpos, hr⟩, UniformSpace.toTopologicalSpace_bot]⟩
/- Instantiate a pseudometric space as a pseudoemetric space. Before we can state the instance,
we need to show that the uniform structure coming from the edistance and the
distance coincide. -/
theorem Metric.uniformity_edist_aux {α} (d : α → α → ℝ≥0) :
⨅ ε > (0 : ℝ), 𝓟 { p : α × α | ↑(d p.1 p.2) < ε } =
⨅ ε > (0 : ℝ≥0∞), 𝓟 { p : α × α | ↑(d p.1 p.2) < ε } := by
simp only [le_antisymm_iff, le_iInf_iff, le_principal_iff]
refine ⟨fun ε hε => ?_, fun ε hε => ?_⟩
· rcases ENNReal.lt_iff_exists_nnreal_btwn.1 hε with ⟨ε', ε'0, ε'ε⟩
refine mem_iInf_of_mem (ε' : ℝ) (mem_iInf_of_mem (ENNReal.coe_pos.1 ε'0) ?_)
exact fun x hx => lt_trans (ENNReal.coe_lt_coe.2 hx) ε'ε
· lift ε to ℝ≥0 using le_of_lt hε
refine mem_iInf_of_mem (ε : ℝ≥0∞) (mem_iInf_of_mem (ENNReal.coe_pos.2 hε) ?_)
exact fun _ => ENNReal.coe_lt_coe.1
theorem Metric.uniformity_edist : 𝓤 α = ⨅ ε > 0, 𝓟 { p : α × α | edist p.1 p.2 < ε } := by
simp only [PseudoMetricSpace.uniformity_dist, dist_nndist, edist_nndist,
Metric.uniformity_edist_aux]
-- see Note [lower instance priority]
/-- A pseudometric space induces a pseudoemetric space -/
instance (priority := 100) PseudoMetricSpace.toPseudoEMetricSpace : PseudoEMetricSpace α :=
{ ‹PseudoMetricSpace α› with
edist_self := by simp [edist_dist]
edist_comm := fun _ _ => by simp only [edist_dist, dist_comm]
edist_triangle := fun x y z => by
simp only [edist_dist, ← ENNReal.ofReal_add, dist_nonneg]
rw [ENNReal.ofReal_le_ofReal_iff _]
· exact dist_triangle _ _ _
· simpa using add_le_add (dist_nonneg : 0 ≤ dist x y) dist_nonneg
uniformity_edist := Metric.uniformity_edist }
/-- In a pseudometric space, an open ball of infinite radius is the whole space -/
theorem Metric.eball_top_eq_univ (x : α) : EMetric.ball x ∞ = Set.univ :=
Set.eq_univ_iff_forall.mpr fun y => edist_lt_top y x
/-- Balls defined using the distance or the edistance coincide -/
@[simp]
theorem Metric.emetric_ball {x : α} {ε : ℝ} : EMetric.ball x (ENNReal.ofReal ε) = ball x ε := by
ext y
simp only [EMetric.mem_ball, mem_ball, edist_dist]
exact ENNReal.ofReal_lt_ofReal_iff_of_nonneg dist_nonneg
/-- Balls defined using the distance or the edistance coincide -/
@[simp]
theorem Metric.emetric_ball_nnreal {x : α} {ε : ℝ≥0} : EMetric.ball x ε = ball x ε := by
rw [← Metric.emetric_ball]
simp
/-- Closed balls defined using the distance or the edistance coincide -/
theorem Metric.emetric_closedBall {x : α} {ε : ℝ} (h : 0 ≤ ε) :
EMetric.closedBall x (ENNReal.ofReal ε) = closedBall x ε := by
ext y; simp [edist_le_ofReal h]
/-- Closed balls defined using the distance or the edistance coincide -/
@[simp]
theorem Metric.emetric_closedBall_nnreal {x : α} {ε : ℝ≥0} :
EMetric.closedBall x ε = closedBall x ε := by
rw [← Metric.emetric_closedBall ε.coe_nonneg, ENNReal.ofReal_coe_nnreal]
@[simp]
theorem Metric.emetric_ball_top (x : α) : EMetric.ball x ⊤ = univ :=
eq_univ_of_forall fun _ => edist_lt_top _ _
/-- Build a new pseudometric space from an old one where the bundled uniform structure is provably
(but typically non-definitionaly) equal to some given uniform structure.
See Note [forgetful inheritance].
See Note [reducible non-instances].
-/
abbrev PseudoMetricSpace.replaceUniformity {α} [U : UniformSpace α] (m : PseudoMetricSpace α)
(H : 𝓤[U] = 𝓤[PseudoEMetricSpace.toUniformSpace]) : PseudoMetricSpace α :=
{ m with
toUniformSpace := U
uniformity_dist := H.trans PseudoMetricSpace.uniformity_dist }
theorem PseudoMetricSpace.replaceUniformity_eq {α} [U : UniformSpace α] (m : PseudoMetricSpace α)
(H : 𝓤[U] = 𝓤[PseudoEMetricSpace.toUniformSpace]) : m.replaceUniformity H = m := by
ext
rfl
-- ensure that the bornology is unchanged when replacing the uniformity.
example {α} [U : UniformSpace α] (m : PseudoMetricSpace α)
(H : 𝓤[U] = 𝓤[PseudoEMetricSpace.toUniformSpace]) :
(PseudoMetricSpace.replaceUniformity m H).toBornology = m.toBornology := by
with_reducible_and_instances rfl
/-- Build a new pseudo metric space from an old one where the bundled topological structure is
provably (but typically non-definitionaly) equal to some given topological structure.
See Note [forgetful inheritance].
See Note [reducible non-instances].
-/
abbrev PseudoMetricSpace.replaceTopology {γ} [U : TopologicalSpace γ] (m : PseudoMetricSpace γ)
(H : U = m.toUniformSpace.toTopologicalSpace) : PseudoMetricSpace γ :=
@PseudoMetricSpace.replaceUniformity γ (m.toUniformSpace.replaceTopology H) m rfl
theorem PseudoMetricSpace.replaceTopology_eq {γ} [U : TopologicalSpace γ] (m : PseudoMetricSpace γ)
(H : U = m.toUniformSpace.toTopologicalSpace) : m.replaceTopology H = m := by
ext
rfl
/-- One gets a pseudometric space from an emetric space if the edistance
is everywhere finite, by pushing the edistance to reals. We set it up so that the edist and the
uniformity are defeq in the pseudometric space and the pseudoemetric space. In this definition, the
distance is given separately, to be able to prescribe some expression which is not defeq to the
push-forward of the edistance to reals. See note [reducible non-instances]. -/
abbrev PseudoEMetricSpace.toPseudoMetricSpaceOfDist {α : Type u} [e : PseudoEMetricSpace α]
(dist : α → α → ℝ) (edist_ne_top : ∀ x y : α, edist x y ≠ ⊤)
(h : ∀ x y, dist x y = ENNReal.toReal (edist x y)) : PseudoMetricSpace α where
dist := dist
dist_self x := by simp [h]
dist_comm x y := by simp [h, edist_comm]
dist_triangle x y z := by
simp only [h]
exact ENNReal.toReal_le_add (edist_triangle _ _ _) (edist_ne_top _ _) (edist_ne_top _ _)
edist := edist
edist_dist _ _ := by simp only [h, ENNReal.ofReal_toReal (edist_ne_top _ _)]
toUniformSpace := e.toUniformSpace
uniformity_dist := e.uniformity_edist.trans <| by
simpa only [ENNReal.coe_toNNReal (edist_ne_top _ _), h]
using (Metric.uniformity_edist_aux fun x y : α => (edist x y).toNNReal).symm
/-- One gets a pseudometric space from an emetric space if the edistance
is everywhere finite, by pushing the edistance to reals. We set it up so that the edist and the
uniformity are defeq in the pseudometric space and the emetric space. -/
abbrev PseudoEMetricSpace.toPseudoMetricSpace {α : Type u} [PseudoEMetricSpace α]
(h : ∀ x y : α, edist x y ≠ ⊤) : PseudoMetricSpace α :=
PseudoEMetricSpace.toPseudoMetricSpaceOfDist (fun x y => ENNReal.toReal (edist x y)) h fun _ _ =>
rfl
/-- Build a new pseudometric space from an old one where the bundled bornology structure is provably
(but typically non-definitionaly) equal to some given bornology structure.
See Note [forgetful inheritance].
See Note [reducible non-instances].
-/
abbrev PseudoMetricSpace.replaceBornology {α} [B : Bornology α] (m : PseudoMetricSpace α)
(H : ∀ s, @IsBounded _ B s ↔ @IsBounded _ PseudoMetricSpace.toBornology s) :
PseudoMetricSpace α :=
{ m with
toBornology := B
cobounded_sets := Set.ext <| compl_surjective.forall.2 fun s =>
(H s).trans <| by rw [isBounded_iff, mem_setOf_eq, compl_compl] }
theorem PseudoMetricSpace.replaceBornology_eq {α} [m : PseudoMetricSpace α] [B : Bornology α]
(H : ∀ s, @IsBounded _ B s ↔ @IsBounded _ PseudoMetricSpace.toBornology s) :
PseudoMetricSpace.replaceBornology _ H = m := by
ext
rfl
-- ensure that the uniformity is unchanged when replacing the bornology.
example {α} [B : Bornology α] (m : PseudoMetricSpace α)
(H : ∀ s, @IsBounded _ B s ↔ @IsBounded _ PseudoMetricSpace.toBornology s) :
(PseudoMetricSpace.replaceBornology m H).toUniformSpace = m.toUniformSpace := by
with_reducible_and_instances rfl
section Real
/-- Instantiate the reals as a pseudometric space. -/
instance Real.pseudoMetricSpace : PseudoMetricSpace ℝ where
dist x y := |x - y|
dist_self := by simp [abs_zero]
dist_comm _ _ := abs_sub_comm _ _
dist_triangle _ _ _ := abs_sub_le _ _ _
theorem Real.dist_eq (x y : ℝ) : dist x y = |x - y| := rfl
theorem Real.nndist_eq (x y : ℝ) : nndist x y = Real.nnabs (x - y) := rfl
theorem Real.nndist_eq' (x y : ℝ) : nndist x y = Real.nnabs (y - x) :=
nndist_comm _ _
theorem Real.dist_0_eq_abs (x : ℝ) : dist x 0 = |x| := by simp [Real.dist_eq]
theorem Real.sub_le_dist (x y : ℝ) : x - y ≤ dist x y := by
rw [Real.dist_eq, le_abs]
exact Or.inl (le_refl _)
theorem Real.ball_eq_Ioo (x r : ℝ) : ball x r = Ioo (x - r) (x + r) :=
Set.ext fun y => by
rw [mem_ball, dist_comm, Real.dist_eq, abs_sub_lt_iff, mem_Ioo, ← sub_lt_iff_lt_add',
sub_lt_comm]
theorem Real.closedBall_eq_Icc {x r : ℝ} : closedBall x r = Icc (x - r) (x + r) := by
ext y
rw [mem_closedBall, dist_comm, Real.dist_eq, abs_sub_le_iff, mem_Icc, ← sub_le_iff_le_add',
sub_le_comm]
theorem Real.Ioo_eq_ball (x y : ℝ) : Ioo x y = ball ((x + y) / 2) ((y - x) / 2) := by
rw [Real.ball_eq_Ioo, ← sub_div, add_comm, ← sub_add, add_sub_cancel_left, add_self_div_two,
← add_div, add_assoc, add_sub_cancel, add_self_div_two]
theorem Real.Icc_eq_closedBall (x y : ℝ) : Icc x y = closedBall ((x + y) / 2) ((y - x) / 2) := by
rw [Real.closedBall_eq_Icc, ← sub_div, add_comm, ← sub_add, add_sub_cancel_left, add_self_div_two,
← add_div, add_assoc, add_sub_cancel, add_self_div_two]
theorem Metric.uniformity_eq_comap_nhds_zero :
𝓤 α = comap (fun p : α × α => dist p.1 p.2) (𝓝 (0 : ℝ)) := by
ext s
simp only [mem_uniformity_dist, (nhds_basis_ball.comap _).mem_iff]
simp [subset_def, Real.dist_0_eq_abs]
theorem tendsto_uniformity_iff_dist_tendsto_zero {f : ι → α × α} {p : Filter ι} :
Tendsto f p (𝓤 α) ↔ Tendsto (fun x => dist (f x).1 (f x).2) p (𝓝 0) := by
rw [Metric.uniformity_eq_comap_nhds_zero, tendsto_comap_iff, Function.comp_def]
theorem Filter.Tendsto.congr_dist {f₁ f₂ : ι → α} {p : Filter ι} {a : α}
(h₁ : Tendsto f₁ p (𝓝 a)) (h : Tendsto (fun x => dist (f₁ x) (f₂ x)) p (𝓝 0)) :
Tendsto f₂ p (𝓝 a) :=
h₁.congr_uniformity <| tendsto_uniformity_iff_dist_tendsto_zero.2 h
alias tendsto_of_tendsto_of_dist := Filter.Tendsto.congr_dist
theorem tendsto_iff_of_dist {f₁ f₂ : ι → α} {p : Filter ι} {a : α}
(h : Tendsto (fun x => dist (f₁ x) (f₂ x)) p (𝓝 0)) : Tendsto f₁ p (𝓝 a) ↔ Tendsto f₂ p (𝓝 a) :=
Uniform.tendsto_congr <| tendsto_uniformity_iff_dist_tendsto_zero.2 h
end Real
theorem PseudoMetricSpace.dist_eq_of_dist_zero (x : α) {y z : α} (h : dist y z = 0) :
dist x y = dist x z :=
dist_comm y x ▸ dist_comm z x ▸ sub_eq_zero.1 (abs_nonpos_iff.1 (h ▸ abs_dist_sub_le y z x))
theorem dist_dist_dist_le_left (x y z : α) : dist (dist x z) (dist y z) ≤ dist x y :=
abs_dist_sub_le ..
theorem dist_dist_dist_le_right (x y z : α) : dist (dist x y) (dist x z) ≤ dist y z := by
simpa only [dist_comm x] using dist_dist_dist_le_left y z x
theorem dist_dist_dist_le (x y x' y' : α) : dist (dist x y) (dist x' y') ≤ dist x x' + dist y y' :=
(dist_triangle _ _ _).trans <|
add_le_add (dist_dist_dist_le_left _ _ _) (dist_dist_dist_le_right _ _ _)
theorem nhds_comap_dist (a : α) : ((𝓝 (0 : ℝ)).comap (dist · a)) = 𝓝 a := by
simp only [@nhds_eq_comap_uniformity α, Metric.uniformity_eq_comap_nhds_zero, comap_comap,
Function.comp_def, dist_comm]
theorem tendsto_iff_dist_tendsto_zero {f : β → α} {x : Filter β} {a : α} :
Tendsto f x (𝓝 a) ↔ Tendsto (fun b => dist (f b) a) x (𝓝 0) := by
rw [← nhds_comap_dist a, tendsto_comap_iff, Function.comp_def]
namespace Metric
variable {x y z : α} {ε ε₁ ε₂ : ℝ} {s : Set α}
theorem ball_subset_interior_closedBall : ball x ε ⊆ interior (closedBall x ε) :=
interior_maximal ball_subset_closedBall isOpen_ball
/-- ε-characterization of the closure in pseudometric spaces -/
theorem mem_closure_iff {s : Set α} {a : α} : a ∈ closure s ↔ ∀ ε > 0, ∃ b ∈ s, dist a b < ε :=
(mem_closure_iff_nhds_basis nhds_basis_ball).trans <| by simp only [mem_ball, dist_comm]
theorem mem_closure_range_iff {e : β → α} {a : α} :
a ∈ closure (range e) ↔ ∀ ε > 0, ∃ k : β, dist a (e k) < ε := by
simp only [mem_closure_iff, exists_range_iff]
theorem mem_closure_range_iff_nat {e : β → α} {a : α} :
a ∈ closure (range e) ↔ ∀ n : ℕ, ∃ k : β, dist a (e k) < 1 / ((n : ℝ) + 1) :=
(mem_closure_iff_nhds_basis nhds_basis_ball_inv_nat_succ).trans <| by
simp only [mem_ball, dist_comm, exists_range_iff, forall_const]
theorem mem_of_closed' {s : Set α} (hs : IsClosed s) {a : α} :
a ∈ s ↔ ∀ ε > 0, ∃ b ∈ s, dist a b < ε := by
simpa only [hs.closure_eq] using @mem_closure_iff _ _ s a
theorem dense_iff {s : Set α} : Dense s ↔ ∀ x, ∀ r > 0, (ball x r ∩ s).Nonempty :=
forall_congr' fun x => by
simp only [mem_closure_iff, Set.Nonempty, exists_prop, mem_inter_iff, mem_ball', and_comm]
theorem dense_iff_iUnion_ball (s : Set α) : Dense s ↔ ∀ r > 0, ⋃ c ∈ s, ball c r = univ := by
simp_rw [eq_univ_iff_forall, mem_iUnion, exists_prop, mem_ball, Dense, mem_closure_iff,
forall_comm (α := α)]
theorem denseRange_iff {f : β → α} : DenseRange f ↔ ∀ x, ∀ r > 0, ∃ y, dist x (f y) < r :=
forall_congr' fun x => by simp only [mem_closure_iff, exists_range_iff]
end Metric
open Additive Multiplicative
instance : PseudoMetricSpace (Additive α) := ‹_›
instance : PseudoMetricSpace (Multiplicative α) := ‹_›
section
variable [PseudoMetricSpace X]
@[simp] theorem nndist_ofMul (a b : X) : nndist (ofMul a) (ofMul b) = nndist a b := rfl
@[simp] theorem nndist_ofAdd (a b : X) : nndist (ofAdd a) (ofAdd b) = nndist a b := rfl
@[simp] theorem nndist_toMul (a b : Additive X) : nndist a.toMul b.toMul = nndist a b := rfl
@[simp]
theorem nndist_toAdd (a b : Multiplicative X) : nndist a.toAdd b.toAdd = nndist a b := rfl
end
open OrderDual
instance : PseudoMetricSpace αᵒᵈ := ‹_›
section
variable [PseudoMetricSpace X]
@[simp] theorem nndist_toDual (a b : X) : nndist (toDual a) (toDual b) = nndist a b := rfl
@[simp] theorem nndist_ofDual (a b : Xᵒᵈ) : nndist (ofDual a) (ofDual b) = nndist a b := rfl
end
| Mathlib/Topology/MetricSpace/Pseudo/Defs.lean | 1,425 | 1,426 | |
/-
Copyright (c) 2018 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes, Johannes Hölzl, Kim Morrison, Jens Wagemaker
-/
import Mathlib.Algebra.Order.Group.Finset
import Mathlib.Algebra.Polynomial.Derivative
import Mathlib.Algebra.Polynomial.Eval.SMul
import Mathlib.Algebra.Polynomial.Roots
import Mathlib.RingTheory.EuclideanDomain
import Mathlib.RingTheory.UniqueFactorizationDomain.NormalizedFactors
/-!
# Theory of univariate polynomials
This file starts looking like the ring theory of $R[X]$
-/
noncomputable section
open Polynomial
namespace Polynomial
universe u v w y z
variable {R : Type u} {S : Type v} {k : Type y} {A : Type z} {a b : R} {n : ℕ}
section CommRing
variable [CommRing R]
theorem rootMultiplicity_sub_one_le_derivative_rootMultiplicity_of_ne_zero
(p : R[X]) (t : R) (hnezero : derivative p ≠ 0) :
p.rootMultiplicity t - 1 ≤ p.derivative.rootMultiplicity t :=
(le_rootMultiplicity_iff hnezero).2 <|
pow_sub_one_dvd_derivative_of_pow_dvd (p.pow_rootMultiplicity_dvd t)
theorem derivative_rootMultiplicity_of_root_of_mem_nonZeroDivisors
{p : R[X]} {t : R} (hpt : Polynomial.IsRoot p t)
(hnzd : (p.rootMultiplicity t : R) ∈ nonZeroDivisors R) :
(derivative p).rootMultiplicity t = p.rootMultiplicity t - 1 := by
by_cases h : p = 0
· simp only [h, map_zero, rootMultiplicity_zero]
obtain ⟨g, hp, hndvd⟩ := p.exists_eq_pow_rootMultiplicity_mul_and_not_dvd h t
set m := p.rootMultiplicity t
have hm : m - 1 + 1 = m := Nat.sub_add_cancel <| (rootMultiplicity_pos h).2 hpt
have hndvd : ¬(X - C t) ^ m ∣ derivative p := by
rw [hp, derivative_mul, dvd_add_left (dvd_mul_right _ _),
derivative_X_sub_C_pow, ← hm, pow_succ, hm, mul_comm (C _), mul_assoc,
dvd_cancel_left_mem_nonZeroDivisors (monic_X_sub_C t |>.pow _ |>.mem_nonZeroDivisors)]
rw [dvd_iff_isRoot, IsRoot] at hndvd ⊢
rwa [eval_mul, eval_C, mul_left_mem_nonZeroDivisors_eq_zero_iff hnzd]
have hnezero : derivative p ≠ 0 := fun h ↦ hndvd (by rw [h]; exact dvd_zero _)
exact le_antisymm (by rwa [rootMultiplicity_le_iff hnezero, hm])
(rootMultiplicity_sub_one_le_derivative_rootMultiplicity_of_ne_zero _ t hnezero)
theorem isRoot_iterate_derivative_of_lt_rootMultiplicity {p : R[X]} {t : R} {n : ℕ}
(hn : n < p.rootMultiplicity t) : (derivative^[n] p).IsRoot t :=
dvd_iff_isRoot.mp <| (dvd_pow_self _ <| Nat.sub_ne_zero_of_lt hn).trans
(pow_sub_dvd_iterate_derivative_of_pow_dvd _ <| p.pow_rootMultiplicity_dvd t)
open Finset in
theorem eval_iterate_derivative_rootMultiplicity {p : R[X]} {t : R} :
(derivative^[p.rootMultiplicity t] p).eval t =
(p.rootMultiplicity t).factorial • (p /ₘ (X - C t) ^ p.rootMultiplicity t).eval t := by
set m := p.rootMultiplicity t with hm
conv_lhs => rw [← p.pow_mul_divByMonic_rootMultiplicity_eq t, ← hm]
rw [iterate_derivative_mul, eval_finset_sum, sum_eq_single_of_mem _ (mem_range.mpr m.succ_pos)]
· rw [m.choose_zero_right, one_smul, eval_mul, m.sub_zero, iterate_derivative_X_sub_pow_self,
eval_natCast, nsmul_eq_mul]; rfl
· intro b hb hb0
rw [iterate_derivative_X_sub_pow, eval_smul, eval_mul, eval_smul, eval_pow,
Nat.sub_sub_self (mem_range_succ_iff.mp hb), eval_sub, eval_X, eval_C, sub_self,
zero_pow hb0, smul_zero, zero_mul, smul_zero]
theorem lt_rootMultiplicity_of_isRoot_iterate_derivative_of_mem_nonZeroDivisors
{p : R[X]} {t : R} {n : ℕ} (h : p ≠ 0)
(hroot : ∀ m ≤ n, (derivative^[m] p).IsRoot t)
(hnzd : (n.factorial : R) ∈ nonZeroDivisors R) :
n < p.rootMultiplicity t := by
by_contra! h'
replace hroot := hroot _ h'
simp only [IsRoot, eval_iterate_derivative_rootMultiplicity] at hroot
obtain ⟨q, hq⟩ := Nat.cast_dvd_cast (α := R) <| Nat.factorial_dvd_factorial h'
rw [hq, mul_mem_nonZeroDivisors] at hnzd
rw [nsmul_eq_mul, mul_left_mem_nonZeroDivisors_eq_zero_iff hnzd.1] at hroot
exact eval_divByMonic_pow_rootMultiplicity_ne_zero t h hroot
theorem lt_rootMultiplicity_of_isRoot_iterate_derivative_of_mem_nonZeroDivisors'
{p : R[X]} {t : R} {n : ℕ} (h : p ≠ 0)
(hroot : ∀ m ≤ n, (derivative^[m] p).IsRoot t)
(hnzd : ∀ m ≤ n, m ≠ 0 → (m : R) ∈ nonZeroDivisors R) :
n < p.rootMultiplicity t := by
apply lt_rootMultiplicity_of_isRoot_iterate_derivative_of_mem_nonZeroDivisors h hroot
clear hroot
induction n with
| zero =>
simp only [Nat.factorial_zero, Nat.cast_one]
exact Submonoid.one_mem _
| succ n ih =>
rw [Nat.factorial_succ, Nat.cast_mul, mul_mem_nonZeroDivisors]
exact ⟨hnzd _ le_rfl n.succ_ne_zero, ih fun m h ↦ hnzd m (h.trans n.le_succ)⟩
theorem lt_rootMultiplicity_iff_isRoot_iterate_derivative_of_mem_nonZeroDivisors
{p : R[X]} {t : R} {n : ℕ} (h : p ≠ 0)
(hnzd : (n.factorial : R) ∈ nonZeroDivisors R) :
n < p.rootMultiplicity t ↔ ∀ m ≤ n, (derivative^[m] p).IsRoot t :=
⟨fun hn _ hm ↦ isRoot_iterate_derivative_of_lt_rootMultiplicity <| hm.trans_lt hn,
fun hr ↦ lt_rootMultiplicity_of_isRoot_iterate_derivative_of_mem_nonZeroDivisors h hr hnzd⟩
theorem lt_rootMultiplicity_iff_isRoot_iterate_derivative_of_mem_nonZeroDivisors'
{p : R[X]} {t : R} {n : ℕ} (h : p ≠ 0)
(hnzd : ∀ m ≤ n, m ≠ 0 → (m : R) ∈ nonZeroDivisors R) :
n < p.rootMultiplicity t ↔ ∀ m ≤ n, (derivative^[m] p).IsRoot t :=
⟨fun hn _ hm ↦ isRoot_iterate_derivative_of_lt_rootMultiplicity <| Nat.lt_of_le_of_lt hm hn,
fun hr ↦ lt_rootMultiplicity_of_isRoot_iterate_derivative_of_mem_nonZeroDivisors' h hr hnzd⟩
theorem one_lt_rootMultiplicity_iff_isRoot_iterate_derivative
{p : R[X]} {t : R} (h : p ≠ 0) :
1 < p.rootMultiplicity t ↔ ∀ m ≤ 1, (derivative^[m] p).IsRoot t :=
lt_rootMultiplicity_iff_isRoot_iterate_derivative_of_mem_nonZeroDivisors h
(by rw [Nat.factorial_one, Nat.cast_one]; exact Submonoid.one_mem _)
theorem one_lt_rootMultiplicity_iff_isRoot
{p : R[X]} {t : R} (h : p ≠ 0) :
1 < p.rootMultiplicity t ↔ p.IsRoot t ∧ (derivative p).IsRoot t := by
rw [one_lt_rootMultiplicity_iff_isRoot_iterate_derivative h]
refine ⟨fun h ↦ ⟨h 0 (by norm_num), h 1 (by norm_num)⟩, fun ⟨h0, h1⟩ m hm ↦ ?_⟩
obtain (_|_|m) := m
exacts [h0, h1, by omega]
end CommRing
section IsDomain
variable [CommRing R] [IsDomain R]
theorem one_lt_rootMultiplicity_iff_isRoot_gcd
[GCDMonoid R[X]] {p : R[X]} {t : R} (h : p ≠ 0) :
1 < p.rootMultiplicity t ↔ (gcd p (derivative p)).IsRoot t := by
simp_rw [one_lt_rootMultiplicity_iff_isRoot h, ← dvd_iff_isRoot, dvd_gcd_iff]
theorem derivative_rootMultiplicity_of_root [CharZero R] {p : R[X]} {t : R} (hpt : p.IsRoot t) :
p.derivative.rootMultiplicity t = p.rootMultiplicity t - 1 := by
by_cases h : p = 0
· rw [h, map_zero, rootMultiplicity_zero]
exact derivative_rootMultiplicity_of_root_of_mem_nonZeroDivisors hpt <|
mem_nonZeroDivisors_of_ne_zero <| Nat.cast_ne_zero.2 ((rootMultiplicity_pos h).2 hpt).ne'
theorem rootMultiplicity_sub_one_le_derivative_rootMultiplicity [CharZero R] (p : R[X]) (t : R) :
p.rootMultiplicity t - 1 ≤ p.derivative.rootMultiplicity t := by
by_cases h : p.IsRoot t
· exact (derivative_rootMultiplicity_of_root h).symm.le
· rw [rootMultiplicity_eq_zero h, zero_tsub]
exact zero_le _
theorem lt_rootMultiplicity_of_isRoot_iterate_derivative
[CharZero R] {p : R[X]} {t : R} {n : ℕ} (h : p ≠ 0)
(hroot : ∀ m ≤ n, (derivative^[m] p).IsRoot t) :
n < p.rootMultiplicity t :=
lt_rootMultiplicity_of_isRoot_iterate_derivative_of_mem_nonZeroDivisors h hroot <|
mem_nonZeroDivisors_of_ne_zero <| Nat.cast_ne_zero.2 <| Nat.factorial_ne_zero n
theorem lt_rootMultiplicity_iff_isRoot_iterate_derivative
[CharZero R] {p : R[X]} {t : R} {n : ℕ} (h : p ≠ 0) :
n < p.rootMultiplicity t ↔ ∀ m ≤ n, (derivative^[m] p).IsRoot t :=
⟨fun hn _ hm ↦ isRoot_iterate_derivative_of_lt_rootMultiplicity <| Nat.lt_of_le_of_lt hm hn,
fun hr ↦ lt_rootMultiplicity_of_isRoot_iterate_derivative h hr⟩
/-- A sufficient condition for the set of roots of a nonzero polynomial `f` to be a subset of the
set of roots of `g` is that `f` divides `f.derivative * g`. Over an algebraically closed field of
characteristic zero, this is also a necessary condition.
See `isRoot_of_isRoot_iff_dvd_derivative_mul` -/
theorem isRoot_of_isRoot_of_dvd_derivative_mul [CharZero R] {f g : R[X]} (hf0 : f ≠ 0)
(hfd : f ∣ f.derivative * g) {a : R} (haf : f.IsRoot a) : g.IsRoot a := by
rcases hfd with ⟨r, hr⟩
have hdf0 : derivative f ≠ 0 := by
contrapose! haf
rw [eq_C_of_derivative_eq_zero haf] at hf0 ⊢
exact not_isRoot_C _ _ <| C_ne_zero.mp hf0
by_contra hg
have hdfg0 : f.derivative * g ≠ 0 := mul_ne_zero hdf0 (by rintro rfl; simp at hg)
have hr' := congr_arg (rootMultiplicity a) hr
rw [rootMultiplicity_mul hdfg0, derivative_rootMultiplicity_of_root haf,
rootMultiplicity_eq_zero hg, add_zero, rootMultiplicity_mul (hr ▸ hdfg0), add_comm,
Nat.sub_eq_iff_eq_add (Nat.succ_le_iff.2 ((rootMultiplicity_pos hf0).2 haf))] at hr'
omega
section NormalizationMonoid
variable [NormalizationMonoid R]
instance instNormalizationMonoid : NormalizationMonoid R[X] where
normUnit p :=
⟨C ↑(normUnit p.leadingCoeff), C ↑(normUnit p.leadingCoeff)⁻¹, by
rw [← RingHom.map_mul, Units.mul_inv, C_1], by rw [← RingHom.map_mul, Units.inv_mul, C_1]⟩
normUnit_zero := Units.ext (by simp)
normUnit_mul hp0 hq0 :=
Units.ext
(by
dsimp
rw [Ne, ← leadingCoeff_eq_zero] at *
rw [leadingCoeff_mul, normUnit_mul hp0 hq0, Units.val_mul, C_mul])
normUnit_coe_units u :=
Units.ext
(by
dsimp
rw [← mul_one u⁻¹, Units.val_mul, Units.eq_inv_mul_iff_mul_eq]
rcases Polynomial.isUnit_iff.1 ⟨u, rfl⟩ with ⟨_, ⟨w, rfl⟩, h2⟩
rw [← h2, leadingCoeff_C, normUnit_coe_units, ← C_mul, Units.mul_inv, C_1]
rfl)
@[simp]
theorem coe_normUnit {p : R[X]} : (normUnit p : R[X]) = C ↑(normUnit p.leadingCoeff) := by
simp [normUnit]
@[simp]
theorem leadingCoeff_normalize (p : R[X]) :
leadingCoeff (normalize p) = normalize (leadingCoeff p) := by simp [normalize_apply]
theorem Monic.normalize_eq_self {p : R[X]} (hp : p.Monic) : normalize p = p := by
simp only [Polynomial.coe_normUnit, normalize_apply, hp.leadingCoeff, normUnit_one,
Units.val_one, Polynomial.C.map_one, mul_one]
theorem roots_normalize {p : R[X]} : (normalize p).roots = p.roots := by
rw [normalize_apply, mul_comm, coe_normUnit, roots_C_mul _ (normUnit (leadingCoeff p)).ne_zero]
theorem normUnit_X : normUnit (X : Polynomial R) = 1 := by
have := coe_normUnit (R := R) (p := X)
rwa [leadingCoeff_X, normUnit_one, Units.val_one, map_one, Units.val_eq_one] at this
theorem X_eq_normalize : (X : Polynomial R) = normalize X := by
simp only [normalize_apply, normUnit_X, Units.val_one, mul_one]
end NormalizationMonoid
end IsDomain
section DivisionRing
variable [DivisionRing R] {p q : R[X]}
theorem degree_pos_of_ne_zero_of_nonunit (hp0 : p ≠ 0) (hp : ¬IsUnit p) : 0 < degree p :=
lt_of_not_ge fun h => by
rw [eq_C_of_degree_le_zero h] at hp0 hp
exact hp (IsUnit.map C (IsUnit.mk0 (coeff p 0) (mt C_inj.2 (by simpa using hp0))))
@[simp]
protected theorem map_eq_zero [Semiring S] [Nontrivial S] (f : R →+* S) : p.map f = 0 ↔ p = 0 := by
simp only [Polynomial.ext_iff]
congr!
simp [map_eq_zero, coeff_map, coeff_zero]
theorem map_ne_zero [Semiring S] [Nontrivial S] {f : R →+* S} (hp : p ≠ 0) : p.map f ≠ 0 :=
mt (Polynomial.map_eq_zero f).1 hp
@[simp]
theorem degree_map [Semiring S] [Nontrivial S] (p : R[X]) (f : R →+* S) :
degree (p.map f) = degree p :=
p.degree_map_eq_of_injective f.injective
@[simp]
theorem natDegree_map [Semiring S] [Nontrivial S] (f : R →+* S) :
natDegree (p.map f) = natDegree p :=
natDegree_eq_of_degree_eq (degree_map _ f)
@[simp]
theorem leadingCoeff_map [Semiring S] [Nontrivial S] (f : R →+* S) :
leadingCoeff (p.map f) = f (leadingCoeff p) := by
simp only [← coeff_natDegree, coeff_map f, natDegree_map]
theorem monic_map_iff [Semiring S] [Nontrivial S] {f : R →+* S} {p : R[X]} :
(p.map f).Monic ↔ p.Monic := by
rw [Monic, leadingCoeff_map, ← f.map_one, Function.Injective.eq_iff f.injective, Monic]
end DivisionRing
section Field
variable [Field R] {p q : R[X]}
theorem isUnit_iff_degree_eq_zero : IsUnit p ↔ degree p = 0 :=
⟨degree_eq_zero_of_isUnit, fun h =>
have : degree p ≤ 0 := by simp [*, le_refl]
have hc : coeff p 0 ≠ 0 := fun hc => by
rw [eq_C_of_degree_le_zero this, hc] at h; simp only [map_zero] at h; contradiction
isUnit_iff_dvd_one.2
⟨C (coeff p 0)⁻¹, by
conv in p => rw [eq_C_of_degree_le_zero this]
rw [← C_mul, mul_inv_cancel₀ hc, C_1]⟩⟩
/-- Division of polynomials. See `Polynomial.divByMonic` for more details. -/
def div (p q : R[X]) :=
C (leadingCoeff q)⁻¹ * (p /ₘ (q * C (leadingCoeff q)⁻¹))
/-- Remainder of polynomial division. See `Polynomial.modByMonic` for more details. -/
def mod (p q : R[X]) :=
p %ₘ (q * C (leadingCoeff q)⁻¹)
private theorem quotient_mul_add_remainder_eq_aux (p q : R[X]) : q * div p q + mod p q = p := by
by_cases h : q = 0
· simp only [h, zero_mul, mod, modByMonic_zero, zero_add]
· conv =>
rhs
rw [← modByMonic_add_div p (monic_mul_leadingCoeff_inv h)]
rw [div, mod, add_comm, mul_assoc]
private theorem remainder_lt_aux (p : R[X]) (hq : q ≠ 0) : degree (mod p q) < degree q := by
rw [← degree_mul_leadingCoeff_inv q hq]
exact degree_modByMonic_lt p (monic_mul_leadingCoeff_inv hq)
instance : Div R[X] :=
⟨div⟩
instance : Mod R[X] :=
⟨mod⟩
theorem div_def : p / q = C (leadingCoeff q)⁻¹ * (p /ₘ (q * C (leadingCoeff q)⁻¹)) :=
rfl
theorem mod_def : p % q = p %ₘ (q * C (leadingCoeff q)⁻¹) := rfl
theorem modByMonic_eq_mod (p : R[X]) (hq : Monic q) : p %ₘ q = p % q :=
show p %ₘ q = p %ₘ (q * C (leadingCoeff q)⁻¹) by
simp only [Monic.def.1 hq, inv_one, mul_one, C_1]
theorem divByMonic_eq_div (p : R[X]) (hq : Monic q) : p /ₘ q = p / q :=
show p /ₘ q = C (leadingCoeff q)⁻¹ * (p /ₘ (q * C (leadingCoeff q)⁻¹)) by
simp only [Monic.def.1 hq, inv_one, C_1, one_mul, mul_one]
theorem mod_X_sub_C_eq_C_eval (p : R[X]) (a : R) : p % (X - C a) = C (p.eval a) :=
modByMonic_eq_mod p (monic_X_sub_C a) ▸ modByMonic_X_sub_C_eq_C_eval _ _
theorem mul_div_eq_iff_isRoot : (X - C a) * (p / (X - C a)) = p ↔ IsRoot p a :=
divByMonic_eq_div p (monic_X_sub_C a) ▸ mul_divByMonic_eq_iff_isRoot
instance instEuclideanDomain : EuclideanDomain R[X] :=
{ Polynomial.commRing,
Polynomial.nontrivial with
quotient := (· / ·)
quotient_zero := by simp [div_def]
remainder := (· % ·)
r := _
r_wellFounded := degree_lt_wf
quotient_mul_add_remainder_eq := quotient_mul_add_remainder_eq_aux
remainder_lt := fun _ _ hq => remainder_lt_aux _ hq
mul_left_not_lt := fun _ _ hq => not_lt_of_ge (degree_le_mul_left _ hq) }
theorem mod_eq_self_iff (hq0 : q ≠ 0) : p % q = p ↔ degree p < degree q :=
⟨fun h => h ▸ EuclideanDomain.mod_lt _ hq0, fun h => by
classical
have : ¬degree (q * C (leadingCoeff q)⁻¹) ≤ degree p :=
not_le_of_gt <| by rwa [degree_mul_leadingCoeff_inv q hq0]
rw [mod_def, modByMonic, dif_pos (monic_mul_leadingCoeff_inv hq0)]
unfold divModByMonicAux
dsimp
simp only [this, false_and, if_false]⟩
theorem div_eq_zero_iff (hq0 : q ≠ 0) : p / q = 0 ↔ degree p < degree q :=
⟨fun h => by
have := EuclideanDomain.div_add_mod p q
rwa [h, mul_zero, zero_add, mod_eq_self_iff hq0] at this,
fun h => by
have hlt : degree p < degree (q * C (leadingCoeff q)⁻¹) := by
rwa [degree_mul_leadingCoeff_inv q hq0]
have hm : Monic (q * C (leadingCoeff q)⁻¹) := monic_mul_leadingCoeff_inv hq0
rw [div_def, (divByMonic_eq_zero_iff hm).2 hlt, mul_zero]⟩
theorem degree_add_div (hq0 : q ≠ 0) (hpq : degree q ≤ degree p) :
degree q + degree (p / q) = degree p := by
have : degree (p % q) < degree (q * (p / q)) :=
calc
degree (p % q) < degree q := EuclideanDomain.mod_lt _ hq0
_ ≤ _ := degree_le_mul_left _ (mt (div_eq_zero_iff hq0).1 (not_lt_of_ge hpq))
conv_rhs =>
rw [← EuclideanDomain.div_add_mod p q, degree_add_eq_left_of_degree_lt this, degree_mul]
theorem degree_div_le (p q : R[X]) : degree (p / q) ≤ degree p := by
by_cases hq : q = 0
· simp [hq]
· rw [div_def, mul_comm, degree_mul_leadingCoeff_inv _ hq]; exact degree_divByMonic_le _ _
theorem degree_div_lt (hp : p ≠ 0) (hq : 0 < degree q) : degree (p / q) < degree p := by
have hq0 : q ≠ 0 := fun hq0 => by simp [hq0] at hq
rw [div_def, mul_comm, degree_mul_leadingCoeff_inv _ hq0]
exact degree_divByMonic_lt _ (monic_mul_leadingCoeff_inv hq0) hp
(by rw [degree_mul_leadingCoeff_inv _ hq0]; exact hq)
theorem isUnit_map [Field k] (f : R →+* k) : IsUnit (p.map f) ↔ IsUnit p := by
simp_rw [isUnit_iff_degree_eq_zero, degree_map]
theorem map_div [Field k] (f : R →+* k) : (p / q).map f = p.map f / q.map f := by
if hq0 : q = 0 then simp [hq0]
else
rw [div_def, div_def, Polynomial.map_mul, map_divByMonic f (monic_mul_leadingCoeff_inv hq0),
Polynomial.map_mul, map_C, leadingCoeff_map, map_inv₀]
theorem map_mod [Field k] (f : R →+* k) : (p % q).map f = p.map f % q.map f := by
by_cases hq0 : q = 0
· simp [hq0]
· rw [mod_def, mod_def, leadingCoeff_map f, ← map_inv₀ f, ← map_C f, ← Polynomial.map_mul f,
map_modByMonic f (monic_mul_leadingCoeff_inv hq0)]
lemma natDegree_mod_lt [Field k] (p : k[X]) {q : k[X]} (hq : q.natDegree ≠ 0) :
(p % q).natDegree < q.natDegree := by
have hq' : q.leadingCoeff ≠ 0 := by
rw [leadingCoeff_ne_zero]
contrapose! hq
simp [hq]
rw [mod_def]
refine (natDegree_modByMonic_lt p ?_ ?_).trans_le ?_
· refine monic_mul_C_of_leadingCoeff_mul_eq_one ?_
rw [mul_inv_eq_one₀ hq']
· contrapose! hq
rw [← natDegree_mul_C_eq_of_mul_eq_one ((inv_mul_eq_one₀ hq').mpr rfl)]
simp [hq]
· exact natDegree_mul_C_le q q.leadingCoeff⁻¹
section
open EuclideanDomain
theorem gcd_map [Field k] [DecidableEq R] [DecidableEq k] (f : R →+* k) :
gcd (p.map f) (q.map f) = (gcd p q).map f :=
GCD.induction p q (fun x => by simp_rw [Polynomial.map_zero, EuclideanDomain.gcd_zero_left])
fun x y _ ih => by rw [gcd_val, ← map_mod, ih, ← gcd_val]
end
theorem eval₂_gcd_eq_zero [CommSemiring k] [DecidableEq R]
{ϕ : R →+* k} {f g : R[X]} {α : k} (hf : f.eval₂ ϕ α = 0)
(hg : g.eval₂ ϕ α = 0) : (EuclideanDomain.gcd f g).eval₂ ϕ α = 0 := by
rw [EuclideanDomain.gcd_eq_gcd_ab f g, Polynomial.eval₂_add, Polynomial.eval₂_mul,
Polynomial.eval₂_mul, hf, hg, zero_mul, zero_mul, zero_add]
theorem eval_gcd_eq_zero [DecidableEq R] {f g : R[X]} {α : R}
(hf : f.eval α = 0) (hg : g.eval α = 0) : (EuclideanDomain.gcd f g).eval α = 0 :=
eval₂_gcd_eq_zero hf hg
theorem root_left_of_root_gcd [CommSemiring k] [DecidableEq R] {ϕ : R →+* k} {f g : R[X]} {α : k}
(hα : (EuclideanDomain.gcd f g).eval₂ ϕ α = 0) : f.eval₂ ϕ α = 0 := by
obtain ⟨p, hp⟩ := EuclideanDomain.gcd_dvd_left f g
rw [hp, Polynomial.eval₂_mul, hα, zero_mul]
theorem root_right_of_root_gcd [CommSemiring k] [DecidableEq R] {ϕ : R →+* k} {f g : R[X]} {α : k}
(hα : (EuclideanDomain.gcd f g).eval₂ ϕ α = 0) : g.eval₂ ϕ α = 0 := by
obtain ⟨p, hp⟩ := EuclideanDomain.gcd_dvd_right f g
rw [hp, Polynomial.eval₂_mul, hα, zero_mul]
theorem root_gcd_iff_root_left_right [CommSemiring k] [DecidableEq R]
{ϕ : R →+* k} {f g : R[X]} {α : k} :
(EuclideanDomain.gcd f g).eval₂ ϕ α = 0 ↔ f.eval₂ ϕ α = 0 ∧ g.eval₂ ϕ α = 0 :=
⟨fun h => ⟨root_left_of_root_gcd h, root_right_of_root_gcd h⟩, fun h => eval₂_gcd_eq_zero h.1 h.2⟩
theorem isRoot_gcd_iff_isRoot_left_right [DecidableEq R] {f g : R[X]} {α : R} :
(EuclideanDomain.gcd f g).IsRoot α ↔ f.IsRoot α ∧ g.IsRoot α :=
root_gcd_iff_root_left_right
theorem isCoprime_map [Field k] (f : R →+* k) : IsCoprime (p.map f) (q.map f) ↔ IsCoprime p q := by
classical
rw [← EuclideanDomain.gcd_isUnit_iff, ← EuclideanDomain.gcd_isUnit_iff, gcd_map, isUnit_map]
theorem mem_roots_map [CommRing k] [IsDomain k] {f : R →+* k} {x : k} (hp : p ≠ 0) :
x ∈ (p.map f).roots ↔ p.eval₂ f x = 0 := by
rw [mem_roots (map_ne_zero hp), IsRoot, Polynomial.eval_map]
theorem rootSet_monomial [CommRing S] [IsDomain S] [Algebra R S] {n : ℕ} (hn : n ≠ 0) {a : R}
(ha : a ≠ 0) : (monomial n a).rootSet S = {0} := by
classical
rw [rootSet, aroots_monomial ha,
Multiset.toFinset_nsmul _ _ hn, Multiset.toFinset_singleton, Finset.coe_singleton]
theorem rootSet_C_mul_X_pow [CommRing S] [IsDomain S] [Algebra R S] {n : ℕ} (hn : n ≠ 0) {a : R}
(ha : a ≠ 0) : rootSet (C a * X ^ n) S = {0} := by
rw [C_mul_X_pow_eq_monomial, rootSet_monomial hn ha]
theorem rootSet_X_pow [CommRing S] [IsDomain S] [Algebra R S] {n : ℕ} (hn : n ≠ 0) :
(X ^ n : R[X]).rootSet S = {0} := by
rw [← one_mul (X ^ n : R[X]), ← C_1, rootSet_C_mul_X_pow hn]
exact one_ne_zero
theorem rootSet_prod [CommRing S] [IsDomain S] [Algebra R S] {ι : Type*} (f : ι → R[X])
(s : Finset ι) (h : s.prod f ≠ 0) : (s.prod f).rootSet S = ⋃ i ∈ s, (f i).rootSet S := by
classical
simp only [rootSet, aroots, ← Finset.mem_coe]
rw [Polynomial.map_prod, roots_prod, Finset.bind_toFinset, s.val_toFinset, Finset.coe_biUnion]
rwa [← Polynomial.map_prod, Ne, Polynomial.map_eq_zero]
theorem roots_C_mul_X_sub_C (b : R) (ha : a ≠ 0) : (C a * X - C b).roots = {a⁻¹ * b} := by
simp [roots_C_mul_X_sub_C_of_IsUnit b ⟨a, a⁻¹, mul_inv_cancel₀ ha, inv_mul_cancel₀ ha⟩]
theorem roots_C_mul_X_add_C (b : R) (ha : a ≠ 0) : (C a * X + C b).roots = {-(a⁻¹ * b)} := by
simp [roots_C_mul_X_add_C_of_IsUnit b ⟨a, a⁻¹, mul_inv_cancel₀ ha, inv_mul_cancel₀ ha⟩]
theorem roots_degree_eq_one (h : degree p = 1) : p.roots = {-((p.coeff 1)⁻¹ * p.coeff 0)} := by
rw [eq_X_add_C_of_degree_le_one (show degree p ≤ 1 by rw [h])]
have : p.coeff 1 ≠ 0 := coeff_ne_zero_of_eq_degree h
simp [roots_C_mul_X_add_C _ this]
theorem exists_root_of_degree_eq_one (h : degree p = 1) : ∃ x, IsRoot p x :=
⟨-((p.coeff 1)⁻¹ * p.coeff 0), by
rw [← mem_roots (by simp [← zero_le_degree_iff, h])]
simp [roots_degree_eq_one h]⟩
theorem coeff_inv_units (u : R[X]ˣ) (n : ℕ) : ((↑u : R[X]).coeff n)⁻¹ = (↑u⁻¹ : R[X]).coeff n := by
rw [eq_C_of_degree_eq_zero (degree_coe_units u), eq_C_of_degree_eq_zero (degree_coe_units u⁻¹),
coeff_C, coeff_C, inv_eq_one_div]
split_ifs
· rw [div_eq_iff_mul_eq (coeff_coe_units_zero_ne_zero u), coeff_zero_eq_eval_zero,
coeff_zero_eq_eval_zero, ← eval_mul, ← Units.val_mul, inv_mul_cancel]
simp
· simp
theorem monic_normalize [DecidableEq R] (hp0 : p ≠ 0) : Monic (normalize p) := by
rw [Ne, ← leadingCoeff_eq_zero, ← Ne, ← isUnit_iff_ne_zero] at hp0
rw [Monic, leadingCoeff_normalize, normalize_eq_one]
apply hp0
theorem leadingCoeff_div (hpq : q.degree ≤ p.degree) :
(p / q).leadingCoeff = p.leadingCoeff / q.leadingCoeff := by
by_cases hq : q = 0
· simp [hq]
rw [div_def, leadingCoeff_mul, leadingCoeff_C,
leadingCoeff_divByMonic_of_monic (monic_mul_leadingCoeff_inv hq) _, mul_comm,
div_eq_mul_inv]
rwa [degree_mul_leadingCoeff_inv q hq]
theorem div_C_mul : p / (C a * q) = C a⁻¹ * (p / q) := by
by_cases ha : a = 0
· simp [ha]
simp only [div_def, leadingCoeff_mul, mul_inv, leadingCoeff_C, C.map_mul, mul_assoc]
congr 3
rw [mul_left_comm q, ← mul_assoc, ← C.map_mul, mul_inv_cancel₀ ha, C.map_one, one_mul]
theorem C_mul_dvd (ha : a ≠ 0) : C a * p ∣ q ↔ p ∣ q :=
⟨fun h => dvd_trans (dvd_mul_left _ _) h, fun ⟨r, hr⟩ =>
⟨C a⁻¹ * r, by
rw [mul_assoc, mul_left_comm p, ← mul_assoc, ← C.map_mul, mul_inv_cancel₀ ha, C.map_one,
one_mul, hr]⟩⟩
theorem dvd_C_mul (ha : a ≠ 0) : p ∣ Polynomial.C a * q ↔ p ∣ q :=
⟨fun ⟨r, hr⟩ =>
⟨C a⁻¹ * r, by
rw [mul_left_comm p, ← hr, ← mul_assoc, ← C.map_mul, inv_mul_cancel₀ ha, C.map_one,
one_mul]⟩,
fun h => dvd_trans h (dvd_mul_left _ _)⟩
theorem coe_normUnit_of_ne_zero [DecidableEq R] (hp : p ≠ 0) :
(normUnit p : R[X]) = C p.leadingCoeff⁻¹ := by
have : p.leadingCoeff ≠ 0 := mt leadingCoeff_eq_zero.mp hp
simp [CommGroupWithZero.coe_normUnit _ this]
theorem map_dvd_map' [Field k] (f : R →+* k) {x y : R[X]} : x.map f ∣ y.map f ↔ x ∣ y := by
by_cases H : x = 0
· rw [H, Polynomial.map_zero, zero_dvd_iff, zero_dvd_iff, Polynomial.map_eq_zero]
· classical
rw [← normalize_dvd_iff, ← @normalize_dvd_iff R[X], normalize_apply, normalize_apply,
coe_normUnit_of_ne_zero H, coe_normUnit_of_ne_zero (mt (Polynomial.map_eq_zero f).1 H),
leadingCoeff_map, ← map_inv₀ f, ← map_C, ← Polynomial.map_mul,
map_dvd_map _ f.injective (monic_mul_leadingCoeff_inv H)]
@[simp]
theorem degree_normalize [DecidableEq R] : degree (normalize p) = degree p := by
simp [normalize_apply]
theorem prime_of_degree_eq_one (hp1 : degree p = 1) : Prime p := by
classical
have : Prime (normalize p) :=
Monic.prime_of_degree_eq_one (hp1 ▸ degree_normalize)
(monic_normalize fun hp0 => absurd hp1 (hp0.symm ▸ by simp [degree_zero]))
exact (normalize_associated _).prime this
theorem irreducible_of_degree_eq_one (hp1 : degree p = 1) : Irreducible p :=
(prime_of_degree_eq_one hp1).irreducible
theorem not_irreducible_C (x : R) : ¬Irreducible (C x) := by
by_cases H : x = 0
· rw [H, C_0]
| exact not_irreducible_zero
| Mathlib/Algebra/Polynomial/FieldDivision.lean | 583 | 583 |
/-
Copyright (c) 2023 Antoine Chambert-Loir and María Inés de Frutos-Fernández. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Antoine Chambert-Loir, María Inés de Frutos-Fernández, Eric Wieser, Bhavik Mehta,
Yaël Dillies
-/
import Mathlib.Algebra.Order.Antidiag.Pi
import Mathlib.Data.Finsupp.Basic
/-!
# Antidiagonal of finitely supported functions as finsets
This file defines the finset of finitely functions summing to a specific value on a finset. Such
finsets should be thought of as the "antidiagonals" in the space of finitely supported functions.
Precisely, for a commutative monoid `μ` with antidiagonals (see `Finset.HasAntidiagonal`),
`Finset.finsuppAntidiag s n` is the finset of all finitely supported functions `f : ι →₀ μ` with
support contained in `s` and such that the sum of its values equals `n : μ`.
We define it using `Finset.piAntidiag s n`, the corresponding antidiagonal in `ι → μ`.
## Main declarations
* `Finset.finsuppAntidiag s n`: Finset of all finitely supported functions `f : ι →₀ μ` with support
contained in `s` and such that the sum of its values equals `n : μ`.
-/
open Finsupp Function
variable {ι μ μ' : Type*}
namespace Finset
section AddCommMonoid
variable [DecidableEq ι] [AddCommMonoid μ] [HasAntidiagonal μ] [DecidableEq μ] {s : Finset ι}
{n : μ} {f : ι →₀ μ}
/-- The finset of functions `ι →₀ μ` with support contained in `s` and sum equal to `n`. -/
def finsuppAntidiag (s : Finset ι) (n : μ) : Finset (ι →₀ μ) :=
(piAntidiag s n).attach.map ⟨fun f ↦ ⟨s.filter (f.1 · ≠ 0), f.1, by
simpa using (mem_piAntidiag.1 f.2).2⟩, fun _ _ hfg ↦ Subtype.ext (congr_arg (⇑) hfg)⟩
@[simp] lemma mem_finsuppAntidiag : f ∈ finsuppAntidiag s n ↔ s.sum f = n ∧ f.support ⊆ s := by
simp [finsuppAntidiag, ← DFunLike.coe_fn_eq, subset_iff]
lemma mem_finsuppAntidiag' :
f ∈ finsuppAntidiag s n ↔ f.sum (fun _ x ↦ x) = n ∧ f.support ⊆ s := by
simp only [mem_finsuppAntidiag, and_congr_left_iff]
rintro hf
rw [sum_of_support_subset (N := μ) f hf (fun _ x ↦ x) fun _ _ ↦ rfl]
@[simp] lemma finsuppAntidiag_empty_zero : finsuppAntidiag (∅ : Finset ι) (0 : μ) = {0} := by
ext f; simp [finsuppAntidiag, ← DFunLike.coe_fn_eq (g := f), eq_comm]
@[simp] lemma finsuppAntidiag_empty_of_ne_zero (hn : n ≠ 0) :
finsuppAntidiag (∅ : Finset ι) n = ∅ :=
eq_empty_of_forall_not_mem (by simp [@eq_comm _ 0, hn.symm])
lemma finsuppAntidiag_empty (n : μ) :
finsuppAntidiag (∅ : Finset ι) n = if n = 0 then {0} else ∅ := by split_ifs with hn <;> simp [*]
theorem mem_finsuppAntidiag_insert {a : ι} {s : Finset ι}
(h : a ∉ s) (n : μ) {f : ι →₀ μ} :
f ∈ finsuppAntidiag (insert a s) n ↔
∃ m ∈ antidiagonal n, ∃ (g : ι →₀ μ),
f = Finsupp.update g a m.1 ∧ g ∈ finsuppAntidiag s m.2 := by
simp only [mem_finsuppAntidiag, mem_antidiagonal, Prod.exists, sum_insert h]
constructor
· rintro ⟨rfl, hsupp⟩
refine ⟨_, _, rfl, Finsupp.erase a f, ?_, ?_, ?_⟩
· rw [update_erase_eq_update, Finsupp.update_self]
· apply sum_congr rfl
intro x hx
rw [Finsupp.erase_ne (ne_of_mem_of_not_mem hx h)]
· rwa [support_erase, ← subset_insert_iff]
· rintro ⟨n1, n2, rfl, g, rfl, rfl, hgsupp⟩
refine ⟨?_, (support_update_subset _ _).trans (insert_subset_insert a hgsupp)⟩
simp only [coe_update]
apply congr_arg₂
· rw [Function.update_self]
· apply sum_congr rfl
intro x hx
rw [update_of_ne (ne_of_mem_of_not_mem hx h) n1 ⇑g]
theorem finsuppAntidiag_insert {a : ι} {s : Finset ι}
(h : a ∉ s) (n : μ) :
finsuppAntidiag (insert a s) n = (antidiagonal n).biUnion
(fun p : μ × μ =>
(finsuppAntidiag s p.snd).attach.map
⟨fun f => Finsupp.update f.val a p.fst,
(fun ⟨f, hf⟩ ⟨g, hg⟩ hfg => Subtype.ext <| by
simp only [mem_val, mem_finsuppAntidiag] at hf hg
simp only [DFunLike.ext_iff] at hfg ⊢
intro x
obtain rfl | hx := eq_or_ne x a
· replace hf := mt (hf.2 ·) h
replace hg := mt (hg.2 ·) h
rw [not_mem_support_iff.mp hf, not_mem_support_iff.mp hg]
· simpa only [coe_update, Function.update, dif_neg hx] using hfg x)⟩) := by
ext f
rw [mem_finsuppAntidiag_insert h, mem_biUnion]
simp_rw [mem_map, mem_attach, true_and, Subtype.exists, Embedding.coeFn_mk, exists_prop, and_comm,
eq_comm]
variable [AddCommMonoid μ'] [HasAntidiagonal μ'] [DecidableEq μ']
-- This should work under the assumption that e is an embedding and an AddHom
lemma mapRange_finsuppAntidiag_subset {e : μ ≃+ μ'} {s : Finset ι} {n : μ} :
(finsuppAntidiag s n).map (mapRange.addEquiv e).toEmbedding ⊆ finsuppAntidiag s (e n) := by
intro f
simp only [mem_map, mem_finsuppAntidiag']
rintro ⟨g, ⟨hsum, hsupp⟩, rfl⟩
simp only [AddEquiv.toEquiv_eq_coe, mapRange.addEquiv_toEquiv, Equiv.coe_toEmbedding,
| mapRange.equiv_apply, EquivLike.coe_coe]
constructor
· rw [sum_mapRange_index (fun _ ↦ rfl), ← hsum, _root_.map_finsuppSum]
· exact subset_trans (support_mapRange) hsupp
lemma mapRange_finsuppAntidiag_eq {e : μ ≃+ μ'} {s : Finset ι} {n : μ} :
(finsuppAntidiag s n).map (mapRange.addEquiv e).toEmbedding = finsuppAntidiag s (e n) := by
ext f
| Mathlib/Algebra/Order/Antidiag/Finsupp.lean | 114 | 121 |
/-
Copyright (c) 2020 Johan Commelin. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johan Commelin
-/
import Mathlib.Algebra.Group.Units.Basic
import Mathlib.Algebra.GroupWithZero.Basic
import Mathlib.Data.Int.Basic
import Mathlib.Lean.Meta.CongrTheorems
import Mathlib.Tactic.Contrapose
import Mathlib.Tactic.Nontriviality
import Mathlib.Tactic.Spread
import Mathlib.Util.AssertExists
/-!
# Lemmas about units in a `MonoidWithZero` or a `GroupWithZero`.
We also define `Ring.inverse`, a globally defined function on any ring
(in fact any `MonoidWithZero`), which inverts units and sends non-units to zero.
-/
-- Guard against import creep
assert_not_exists DenselyOrdered Equiv Subtype.restrict Multiplicative
variable {α M₀ G₀ : Type*}
variable [MonoidWithZero M₀]
namespace Units
/-- An element of the unit group of a nonzero monoid with zero represented as an element
of the monoid is nonzero. -/
@[simp]
theorem ne_zero [Nontrivial M₀] (u : M₀ˣ) : (u : M₀) ≠ 0 :=
left_ne_zero_of_mul_eq_one u.mul_inv
-- We can't use `mul_eq_zero` + `Units.ne_zero` in the next two lemmas because we don't assume
-- `Nonzero M₀`.
@[simp]
theorem mul_left_eq_zero (u : M₀ˣ) {a : M₀} : a * u = 0 ↔ a = 0 :=
⟨fun h => by simpa using mul_eq_zero_of_left h ↑u⁻¹, fun h => mul_eq_zero_of_left h u⟩
@[simp]
theorem mul_right_eq_zero (u : M₀ˣ) {a : M₀} : ↑u * a = 0 ↔ a = 0 :=
⟨fun h => by simpa using mul_eq_zero_of_right (↑u⁻¹) h, mul_eq_zero_of_right (u : M₀)⟩
end Units
namespace IsUnit
theorem ne_zero [Nontrivial M₀] {a : M₀} (ha : IsUnit a) : a ≠ 0 :=
let ⟨u, hu⟩ := ha
hu ▸ u.ne_zero
theorem mul_right_eq_zero {a b : M₀} (ha : IsUnit a) : a * b = 0 ↔ b = 0 :=
let ⟨u, hu⟩ := ha
hu ▸ u.mul_right_eq_zero
theorem mul_left_eq_zero {a b : M₀} (hb : IsUnit b) : a * b = 0 ↔ a = 0 :=
let ⟨u, hu⟩ := hb
hu ▸ u.mul_left_eq_zero
end IsUnit
@[simp]
theorem isUnit_zero_iff : IsUnit (0 : M₀) ↔ (0 : M₀) = 1 :=
⟨fun ⟨⟨_, a, (a0 : 0 * a = 1), _⟩, rfl⟩ => by rwa [zero_mul] at a0, fun h =>
@isUnit_of_subsingleton _ _ (subsingleton_of_zero_eq_one h) 0⟩
theorem not_isUnit_zero [Nontrivial M₀] : ¬IsUnit (0 : M₀) :=
mt isUnit_zero_iff.1 zero_ne_one
namespace Ring
open Classical in
/-- Introduce a function `inverse` on a monoid with zero `M₀`, which sends `x` to `x⁻¹` if `x` is
invertible and to `0` otherwise. This definition is somewhat ad hoc, but one needs a fully (rather
than partially) defined inverse function for some purposes, including for calculus.
Note that while this is in the `Ring` namespace for brevity, it requires the weaker assumption
`MonoidWithZero M₀` instead of `Ring M₀`. -/
noncomputable def inverse : M₀ → M₀ := fun x => if h : IsUnit x then ((h.unit⁻¹ : M₀ˣ) : M₀) else 0
/-- By definition, if `x` is invertible then `inverse x = x⁻¹`. -/
@[simp]
theorem inverse_unit (u : M₀ˣ) : inverse (u : M₀) = (u⁻¹ : M₀ˣ) := by
rw [inverse, dif_pos u.isUnit, IsUnit.unit_of_val_units]
theorem inverse_of_isUnit {x : M₀} (h : IsUnit x) : inverse x = ((h.unit⁻¹ : M₀ˣ) : M₀) := dif_pos h
/-- By definition, if `x` is not invertible then `inverse x = 0`. -/
@[simp]
theorem inverse_non_unit (x : M₀) (h : ¬IsUnit x) : inverse x = 0 :=
dif_neg h
theorem mul_inverse_cancel (x : M₀) (h : IsUnit x) : x * inverse x = 1 := by
rcases h with ⟨u, rfl⟩
rw [inverse_unit, Units.mul_inv]
theorem inverse_mul_cancel (x : M₀) (h : IsUnit x) : inverse x * x = 1 := by
rcases h with ⟨u, rfl⟩
rw [inverse_unit, Units.inv_mul]
theorem mul_inverse_cancel_right (x y : M₀) (h : IsUnit x) : y * x * inverse x = y := by
rw [mul_assoc, mul_inverse_cancel x h, mul_one]
theorem inverse_mul_cancel_right (x y : M₀) (h : IsUnit x) : y * inverse x * x = y := by
rw [mul_assoc, inverse_mul_cancel x h, mul_one]
theorem mul_inverse_cancel_left (x y : M₀) (h : IsUnit x) : x * (inverse x * y) = y := by
rw [← mul_assoc, mul_inverse_cancel x h, one_mul]
theorem inverse_mul_cancel_left (x y : M₀) (h : IsUnit x) : inverse x * (x * y) = y := by
rw [← mul_assoc, inverse_mul_cancel x h, one_mul]
theorem inverse_mul_eq_iff_eq_mul (x y z : M₀) (h : IsUnit x) : inverse x * y = z ↔ y = x * z :=
⟨fun h1 => by rw [← h1, mul_inverse_cancel_left _ _ h],
fun h1 => by rw [h1, inverse_mul_cancel_left _ _ h]⟩
theorem eq_mul_inverse_iff_mul_eq (x y z : M₀) (h : IsUnit z) : x = y * inverse z ↔ x * z = y :=
⟨fun h1 => by rw [h1, inverse_mul_cancel_right _ _ h],
fun h1 => by rw [← h1, mul_inverse_cancel_right _ _ h]⟩
variable (M₀)
@[simp]
theorem inverse_one : inverse (1 : M₀) = 1 :=
inverse_unit 1
| @[simp]
theorem inverse_zero : inverse (0 : M₀) = 0 := by
| Mathlib/Algebra/GroupWithZero/Units/Basic.lean | 130 | 131 |
/-
Copyright (c) 2021 Oliver Nash. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Oliver Nash
-/
import Mathlib.Algebra.Lie.Solvable
import Mathlib.Algebra.Lie.Quotient
import Mathlib.Algebra.Lie.Normalizer
import Mathlib.Algebra.Order.Archimedean.Basic
import Mathlib.LinearAlgebra.Eigenspace.Basic
import Mathlib.RingTheory.Artinian.Module
import Mathlib.RingTheory.Nilpotent.Lemmas
/-!
# Nilpotent Lie algebras
Like groups, Lie algebras admit a natural concept of nilpotency. More generally, any Lie module
carries a natural concept of nilpotency. We define these here via the lower central series.
## Main definitions
* `LieModule.lowerCentralSeries`
* `LieModule.IsNilpotent`
* `LieModule.maxNilpotentSubmodule`
* `LieAlgebra.maxNilpotentIdeal`
## Tags
lie algebra, lower central series, nilpotent, max nilpotent ideal
-/
universe u v w w₁ w₂
section NilpotentModules
variable {R : Type u} {L : Type v} {M : Type w}
variable [CommRing R] [LieRing L] [LieAlgebra R L] [AddCommGroup M] [Module R M]
variable [LieRingModule L M]
variable (k : ℕ) (N : LieSubmodule R L M)
namespace LieSubmodule
/-- A generalisation of the lower central series. The zeroth term is a specified Lie submodule of
a Lie module. In the case when we specify the top ideal `⊤` of the Lie algebra, regarded as a Lie
module over itself, we get the usual lower central series of a Lie algebra.
It can be more convenient to work with this generalisation when considering the lower central series
of a Lie submodule, regarded as a Lie module in its own right, since it provides a type-theoretic
expression of the fact that the terms of the Lie submodule's lower central series are also Lie
submodules of the enclosing Lie module.
See also `LieSubmodule.lowerCentralSeries_eq_lcs_comap` and
`LieSubmodule.lowerCentralSeries_map_eq_lcs` below, as well as `LieSubmodule.ucs`. -/
def lcs : LieSubmodule R L M → LieSubmodule R L M :=
(fun N => ⁅(⊤ : LieIdeal R L), N⁆)^[k]
@[simp]
theorem lcs_zero (N : LieSubmodule R L M) : N.lcs 0 = N :=
rfl
@[simp]
theorem lcs_succ : N.lcs (k + 1) = ⁅(⊤ : LieIdeal R L), N.lcs k⁆ :=
Function.iterate_succ_apply' (fun N' => ⁅⊤, N'⁆) k N
@[simp]
lemma lcs_sup {N₁ N₂ : LieSubmodule R L M} {k : ℕ} :
(N₁ ⊔ N₂).lcs k = N₁.lcs k ⊔ N₂.lcs k := by
induction k with
| zero => simp
| succ k ih => simp only [LieSubmodule.lcs_succ, ih, LieSubmodule.lie_sup]
end LieSubmodule
namespace LieModule
variable (R L M)
/-- The lower central series of Lie submodules of a Lie module. -/
def lowerCentralSeries : LieSubmodule R L M :=
(⊤ : LieSubmodule R L M).lcs k
@[simp]
theorem lowerCentralSeries_zero : lowerCentralSeries R L M 0 = ⊤ :=
rfl
@[simp]
theorem lowerCentralSeries_succ :
lowerCentralSeries R L M (k + 1) = ⁅(⊤ : LieIdeal R L), lowerCentralSeries R L M k⁆ :=
(⊤ : LieSubmodule R L M).lcs_succ k
private theorem coe_lowerCentralSeries_eq_int_aux (R₁ R₂ L M : Type*)
[CommRing R₁] [CommRing R₂] [AddCommGroup M]
[LieRing L] [LieAlgebra R₁ L] [LieAlgebra R₂ L] [Module R₁ M] [Module R₂ M] [LieRingModule L M]
[LieModule R₁ L M] (k : ℕ) :
let I := lowerCentralSeries R₂ L M k; let S : Set M := {⁅a, b⁆ | (a : L) (b ∈ I)}
(Submodule.span R₁ S : Set M) ≤ (Submodule.span R₂ S : Set M) := by
intro I S x hx
simp only [SetLike.mem_coe] at hx ⊢
induction hx using Submodule.closure_induction with
| zero => exact Submodule.zero_mem _
| add y z hy₁ hz₁ hy₂ hz₂ => exact Submodule.add_mem _ hy₂ hz₂
| smul_mem c y hy =>
obtain ⟨a, b, hb, rfl⟩ := hy
rw [← smul_lie]
exact Submodule.subset_span ⟨c • a, b, hb, rfl⟩
theorem coe_lowerCentralSeries_eq_int [LieModule R L M] (k : ℕ) :
(lowerCentralSeries R L M k : Set M) = (lowerCentralSeries ℤ L M k : Set M) := by
rw [← LieSubmodule.coe_toSubmodule, ← LieSubmodule.coe_toSubmodule]
induction k with
| zero => rfl
| succ k ih =>
rw [lowerCentralSeries_succ, lowerCentralSeries_succ]
rw [LieSubmodule.lieIdeal_oper_eq_linear_span', LieSubmodule.lieIdeal_oper_eq_linear_span']
rw [Set.ext_iff] at ih
simp only [SetLike.mem_coe, LieSubmodule.mem_toSubmodule] at ih
simp only [LieSubmodule.mem_top, ih, true_and]
apply le_antisymm
· exact coe_lowerCentralSeries_eq_int_aux _ _ L M k
· simp only [← ih]
exact coe_lowerCentralSeries_eq_int_aux _ _ L M k
end LieModule
namespace LieSubmodule
open LieModule
theorem lcs_le_self : N.lcs k ≤ N := by
induction k with
| zero => simp
| succ k ih =>
simp only [lcs_succ]
exact (LieSubmodule.mono_lie_right ⊤ ih).trans (N.lie_le_right ⊤)
variable [LieModule R L M]
theorem lowerCentralSeries_eq_lcs_comap : lowerCentralSeries R L N k = (N.lcs k).comap N.incl := by
induction k with
| zero => simp
| succ k ih =>
simp only [lcs_succ, lowerCentralSeries_succ] at ih ⊢
have : N.lcs k ≤ N.incl.range := by
rw [N.range_incl]
apply lcs_le_self
rw [ih, LieSubmodule.comap_bracket_eq _ N.incl _ N.ker_incl this]
theorem lowerCentralSeries_map_eq_lcs : (lowerCentralSeries R L N k).map N.incl = N.lcs k := by
rw [lowerCentralSeries_eq_lcs_comap, LieSubmodule.map_comap_incl, inf_eq_right]
apply lcs_le_self
theorem lowerCentralSeries_eq_bot_iff_lcs_eq_bot:
lowerCentralSeries R L N k = ⊥ ↔ lcs k N = ⊥ := by
refine ⟨fun h ↦ ?_, fun h ↦ ?_⟩
· rw [← N.lowerCentralSeries_map_eq_lcs, ← LieModuleHom.le_ker_iff_map]
simpa
· rw [N.lowerCentralSeries_eq_lcs_comap, comap_incl_eq_bot]
simp [h]
end LieSubmodule
namespace LieModule
variable {M₂ : Type w₁} [AddCommGroup M₂] [Module R M₂] [LieRingModule L M₂] [LieModule R L M₂]
variable (R L M)
theorem antitone_lowerCentralSeries : Antitone <| lowerCentralSeries R L M := by
intro l k
induction k generalizing l with
| zero => exact fun h ↦ (Nat.le_zero.mp h).symm ▸ le_rfl
| succ k ih =>
intro h
rcases Nat.of_le_succ h with (hk | hk)
· rw [lowerCentralSeries_succ]
exact (LieSubmodule.mono_lie_right ⊤ (ih hk)).trans (LieSubmodule.lie_le_right _ _)
· exact hk.symm ▸ le_rfl
theorem eventually_iInf_lowerCentralSeries_eq [IsArtinian R M] :
∀ᶠ l in Filter.atTop, ⨅ k, lowerCentralSeries R L M k = lowerCentralSeries R L M l := by
have h_wf : WellFoundedGT (LieSubmodule R L M)ᵒᵈ :=
LieSubmodule.wellFoundedLT_of_isArtinian R L M
obtain ⟨n, hn : ∀ m, n ≤ m → lowerCentralSeries R L M n = lowerCentralSeries R L M m⟩ :=
h_wf.monotone_chain_condition ⟨_, antitone_lowerCentralSeries R L M⟩
refine Filter.eventually_atTop.mpr ⟨n, fun l hl ↦ le_antisymm (iInf_le _ _) (le_iInf fun m ↦ ?_)⟩
rcases le_or_lt l m with h | h
· rw [← hn _ hl, ← hn _ (hl.trans h)]
· exact antitone_lowerCentralSeries R L M (le_of_lt h)
theorem trivial_iff_lower_central_eq_bot : IsTrivial L M ↔ lowerCentralSeries R L M 1 = ⊥ := by
constructor <;> intro h
· simp
· rw [LieSubmodule.eq_bot_iff] at h; apply IsTrivial.mk; intro x m; apply h
apply LieSubmodule.subset_lieSpan
simp only [LieSubmodule.top_coe, Subtype.exists, LieSubmodule.mem_top, exists_prop, true_and,
Set.mem_setOf]
exact ⟨x, m, rfl⟩
section
variable [LieModule R L M]
theorem iterate_toEnd_mem_lowerCentralSeries (x : L) (m : M) (k : ℕ) :
(toEnd R L M x)^[k] m ∈ lowerCentralSeries R L M k := by
induction k with
| zero => simp only [Function.iterate_zero, lowerCentralSeries_zero, LieSubmodule.mem_top]
| succ k ih =>
simp only [lowerCentralSeries_succ, Function.comp_apply, Function.iterate_succ',
toEnd_apply_apply]
exact LieSubmodule.lie_mem_lie (LieSubmodule.mem_top x) ih
theorem iterate_toEnd_mem_lowerCentralSeries₂ (x y : L) (m : M) (k : ℕ) :
(toEnd R L M x ∘ₗ toEnd R L M y)^[k] m ∈
lowerCentralSeries R L M (2 * k) := by
induction k with
| zero => simp
| succ k ih =>
have hk : 2 * k.succ = (2 * k + 1) + 1 := rfl
simp only [lowerCentralSeries_succ, Function.comp_apply, Function.iterate_succ', hk,
toEnd_apply_apply, LinearMap.coe_comp, toEnd_apply_apply]
refine LieSubmodule.lie_mem_lie (LieSubmodule.mem_top x) ?_
exact LieSubmodule.lie_mem_lie (LieSubmodule.mem_top y) ih
variable {R L M}
theorem map_lowerCentralSeries_le (f : M →ₗ⁅R,L⁆ M₂) :
(lowerCentralSeries R L M k).map f ≤ lowerCentralSeries R L M₂ k := by
induction k with
| zero => simp only [lowerCentralSeries_zero, le_top]
| succ k ih =>
simp only [LieModule.lowerCentralSeries_succ, LieSubmodule.map_bracket_eq]
exact LieSubmodule.mono_lie_right ⊤ ih
lemma map_lowerCentralSeries_eq {f : M →ₗ⁅R,L⁆ M₂} (hf : Function.Surjective f) :
(lowerCentralSeries R L M k).map f = lowerCentralSeries R L M₂ k := by
apply le_antisymm (map_lowerCentralSeries_le k f)
induction k with
| zero =>
rwa [lowerCentralSeries_zero, lowerCentralSeries_zero, top_le_iff, f.map_top,
f.range_eq_top]
| succ =>
simp only [lowerCentralSeries_succ, LieSubmodule.map_bracket_eq]
apply LieSubmodule.mono_lie_right
assumption
end
open LieAlgebra
theorem derivedSeries_le_lowerCentralSeries (k : ℕ) :
derivedSeries R L k ≤ lowerCentralSeries R L L k := by
induction k with
| zero => rw [derivedSeries_def, derivedSeriesOfIdeal_zero, lowerCentralSeries_zero]
| succ k h =>
have h' : derivedSeries R L k ≤ ⊤ := by simp only [le_top]
rw [derivedSeries_def, derivedSeriesOfIdeal_succ, lowerCentralSeries_succ]
exact LieSubmodule.mono_lie h' h
/-- A Lie module is nilpotent if its lower central series reaches 0 (in a finite number of
steps). -/
@[mk_iff isNilpotent_iff_int]
class IsNilpotent : Prop where
mk_int ::
nilpotent_int : ∃ k, lowerCentralSeries ℤ L M k = ⊥
section
variable [LieModule R L M]
/-- See also `LieModule.isNilpotent_iff_exists_ucs_eq_top`. -/
lemma isNilpotent_iff :
IsNilpotent L M ↔ ∃ k, lowerCentralSeries R L M k = ⊥ := by
simp [isNilpotent_iff_int, SetLike.ext'_iff, coe_lowerCentralSeries_eq_int R L M]
lemma IsNilpotent.nilpotent [IsNilpotent L M] : ∃ k, lowerCentralSeries R L M k = ⊥ :=
(isNilpotent_iff R L M).mp ‹_›
variable {R L} in
lemma IsNilpotent.mk {k : ℕ} (h : lowerCentralSeries R L M k = ⊥) : IsNilpotent L M :=
(isNilpotent_iff R L M).mpr ⟨k, h⟩
@[deprecated IsNilpotent.nilpotent (since := "2025-01-07")]
theorem exists_lowerCentralSeries_eq_bot_of_isNilpotent [IsNilpotent L M] :
∃ k, lowerCentralSeries R L M k = ⊥ :=
IsNilpotent.nilpotent R L M
@[simp] lemma iInf_lowerCentralSeries_eq_bot_of_isNilpotent [IsNilpotent L M] :
⨅ k, lowerCentralSeries R L M k = ⊥ := by
obtain ⟨k, hk⟩ := IsNilpotent.nilpotent R L M
rw [eq_bot_iff, ← hk]
exact iInf_le _ _
end
section
variable {R L M}
variable [LieModule R L M]
theorem _root_.LieSubmodule.isNilpotent_iff_exists_lcs_eq_bot (N : LieSubmodule R L M) :
LieModule.IsNilpotent L N ↔ ∃ k, N.lcs k = ⊥ := by
rw [isNilpotent_iff R L N]
refine exists_congr fun k => ?_
rw [N.lowerCentralSeries_eq_lcs_comap k, LieSubmodule.comap_incl_eq_bot,
inf_eq_right.mpr (N.lcs_le_self k)]
variable (R L M)
instance (priority := 100) trivialIsNilpotent [IsTrivial L M] : IsNilpotent L M :=
⟨by use 1; simp⟩
instance instIsNilpotentSup (M₁ M₂ : LieSubmodule R L M) [IsNilpotent L M₁] [IsNilpotent L M₂] :
IsNilpotent L (M₁ ⊔ M₂ : LieSubmodule R L M) := by
obtain ⟨k, hk⟩ := IsNilpotent.nilpotent R L M₁
obtain ⟨l, hl⟩ := IsNilpotent.nilpotent R L M₂
let lcs_eq_bot {m n} (N : LieSubmodule R L M) (le : m ≤ n) (hn : lowerCentralSeries R L N m = ⊥) :
lowerCentralSeries R L N n = ⊥ := by
simpa [hn] using antitone_lowerCentralSeries R L N le
have h₁ : lowerCentralSeries R L M₁ (k ⊔ l) = ⊥ := lcs_eq_bot M₁ (Nat.le_max_left k l) hk
have h₂ : lowerCentralSeries R L M₂ (k ⊔ l) = ⊥ := lcs_eq_bot M₂ (Nat.le_max_right k l) hl
refine (isNilpotent_iff R L (M₁ + M₂)).mpr ⟨k ⊔ l, ?_⟩
simp [LieSubmodule.add_eq_sup, (M₁ ⊔ M₂).lowerCentralSeries_eq_lcs_comap, LieSubmodule.lcs_sup,
(M₁.lowerCentralSeries_eq_bot_iff_lcs_eq_bot (k ⊔ l)).1 h₁,
(M₂.lowerCentralSeries_eq_bot_iff_lcs_eq_bot (k ⊔ l)).1 h₂, LieSubmodule.comap_incl_eq_bot]
theorem exists_forall_pow_toEnd_eq_zero [IsNilpotent L M] :
∃ k : ℕ, ∀ x : L, toEnd R L M x ^ k = 0 := by
obtain ⟨k, hM⟩ := IsNilpotent.nilpotent R L M
use k
intro x; ext m
rw [Module.End.pow_apply, LinearMap.zero_apply, ← @LieSubmodule.mem_bot R L M, ← hM]
exact iterate_toEnd_mem_lowerCentralSeries R L M x m k
theorem isNilpotent_toEnd_of_isNilpotent [IsNilpotent L M] (x : L) :
_root_.IsNilpotent (toEnd R L M x) := by
change ∃ k, toEnd R L M x ^ k = 0
have := exists_forall_pow_toEnd_eq_zero R L M
tauto
theorem isNilpotent_toEnd_of_isNilpotent₂ [IsNilpotent L M] (x y : L) :
_root_.IsNilpotent (toEnd R L M x ∘ₗ toEnd R L M y) := by
obtain ⟨k, hM⟩ := IsNilpotent.nilpotent R L M
replace hM : lowerCentralSeries R L M (2 * k) = ⊥ := by
rw [eq_bot_iff, ← hM]; exact antitone_lowerCentralSeries R L M (by omega)
use k
ext m
rw [Module.End.pow_apply, LinearMap.zero_apply, ← LieSubmodule.mem_bot (R := R) (L := L), ← hM]
exact iterate_toEnd_mem_lowerCentralSeries₂ R L M x y m k
@[simp] lemma maxGenEigenSpace_toEnd_eq_top [IsNilpotent L M] (x : L) :
((toEnd R L M x).maxGenEigenspace 0) = ⊤ := by
ext m
simp only [Module.End.mem_maxGenEigenspace, zero_smul, sub_zero, Submodule.mem_top,
iff_true]
obtain ⟨k, hk⟩ := exists_forall_pow_toEnd_eq_zero R L M
exact ⟨k, by simp [hk x]⟩
/-- If the quotient of a Lie module `M` by a Lie submodule on which the Lie algebra acts trivially
is nilpotent then `M` is nilpotent.
This is essentially the Lie module equivalent of the fact that a central
extension of nilpotent Lie algebras is nilpotent. See `LieAlgebra.nilpotent_of_nilpotent_quotient`
below for the corresponding result for Lie algebras. -/
theorem nilpotentOfNilpotentQuotient {N : LieSubmodule R L M} (h₁ : N ≤ maxTrivSubmodule R L M)
(h₂ : IsNilpotent L (M ⧸ N)) : IsNilpotent L M := by
rw [isNilpotent_iff R L] at h₂ ⊢
obtain ⟨k, hk⟩ := h₂
use k + 1
simp only [lowerCentralSeries_succ]
suffices lowerCentralSeries R L M k ≤ N by
replace this := LieSubmodule.mono_lie_right ⊤ (le_trans this h₁)
rwa [ideal_oper_maxTrivSubmodule_eq_bot, le_bot_iff] at this
rw [← LieSubmodule.Quotient.map_mk'_eq_bot_le, ← le_bot_iff, ← hk]
exact map_lowerCentralSeries_le k (LieSubmodule.Quotient.mk' N)
theorem isNilpotent_quotient_iff :
IsNilpotent L (M ⧸ N) ↔ ∃ k, lowerCentralSeries R L M k ≤ N := by
rw [isNilpotent_iff R L]
refine exists_congr fun k ↦ ?_
rw [← LieSubmodule.Quotient.map_mk'_eq_bot_le, map_lowerCentralSeries_eq k
(LieSubmodule.Quotient.surjective_mk' N)]
theorem iInf_lcs_le_of_isNilpotent_quot (h : IsNilpotent L (M ⧸ N)) :
⨅ k, lowerCentralSeries R L M k ≤ N := by
obtain ⟨k, hk⟩ := (isNilpotent_quotient_iff R L M N).mp h
exact iInf_le_of_le k hk
end
/-- Given a nilpotent Lie module `M` with lower central series `M = C₀ ≥ C₁ ≥ ⋯ ≥ Cₖ = ⊥`, this is
the natural number `k` (the number of inclusions).
For a non-nilpotent module, we use the junk value 0. -/
noncomputable def nilpotencyLength : ℕ :=
sInf {k | lowerCentralSeries ℤ L M k = ⊥}
@[simp]
theorem nilpotencyLength_eq_zero_iff [IsNilpotent L M] :
nilpotencyLength L M = 0 ↔ Subsingleton M := by
let s := {k | lowerCentralSeries ℤ L M k = ⊥}
have hs : s.Nonempty := by
obtain ⟨k, hk⟩ := IsNilpotent.nilpotent ℤ L M
exact ⟨k, hk⟩
change sInf s = 0 ↔ _
rw [← LieSubmodule.subsingleton_iff ℤ L M, ← subsingleton_iff_bot_eq_top, ←
lowerCentralSeries_zero, @eq_comm (LieSubmodule ℤ L M)]
refine ⟨fun h => h ▸ Nat.sInf_mem hs, fun h => ?_⟩
rw [Nat.sInf_eq_zero]
exact Or.inl h
section
variable [LieModule R L M]
theorem nilpotencyLength_eq_succ_iff (k : ℕ) :
nilpotencyLength L M = k + 1 ↔
lowerCentralSeries R L M (k + 1) = ⊥ ∧ lowerCentralSeries R L M k ≠ ⊥ := by
have aux (k : ℕ) : lowerCentralSeries R L M k = ⊥ ↔ lowerCentralSeries ℤ L M k = ⊥ := by
simp [SetLike.ext'_iff, coe_lowerCentralSeries_eq_int R L M]
let s := {k | lowerCentralSeries ℤ L M k = ⊥}
rw [aux, ne_eq, aux]
change sInf s = k + 1 ↔ k + 1 ∈ s ∧ k ∉ s
have hs : ∀ k₁ k₂, k₁ ≤ k₂ → k₁ ∈ s → k₂ ∈ s := by
rintro k₁ k₂ h₁₂ (h₁ : lowerCentralSeries ℤ L M k₁ = ⊥)
exact eq_bot_iff.mpr (h₁ ▸ antitone_lowerCentralSeries ℤ L M h₁₂)
exact Nat.sInf_upward_closed_eq_succ_iff hs k
@[simp]
theorem nilpotencyLength_eq_one_iff [Nontrivial M] :
nilpotencyLength L M = 1 ↔ IsTrivial L M := by
rw [nilpotencyLength_eq_succ_iff ℤ, ← trivial_iff_lower_central_eq_bot]
simp
theorem isTrivial_of_nilpotencyLength_le_one [IsNilpotent L M] (h : nilpotencyLength L M ≤ 1) :
IsTrivial L M := by
nontriviality M
rcases Nat.le_one_iff_eq_zero_or_eq_one.mp h with h | h
· rw [nilpotencyLength_eq_zero_iff] at h; infer_instance
· rwa [nilpotencyLength_eq_one_iff] at h
end
/-- Given a non-trivial nilpotent Lie module `M` with lower central series
`M = C₀ ≥ C₁ ≥ ⋯ ≥ Cₖ = ⊥`, this is the `k-1`th term in the lower central series (the last
non-trivial term).
For a trivial or non-nilpotent module, this is the bottom submodule, `⊥`. -/
noncomputable def lowerCentralSeriesLast : LieSubmodule R L M :=
match nilpotencyLength L M with
| 0 => ⊥
| k + 1 => lowerCentralSeries R L M k
theorem lowerCentralSeriesLast_le_max_triv [LieModule R L M] :
lowerCentralSeriesLast R L M ≤ maxTrivSubmodule R L M := by
rw [lowerCentralSeriesLast]
rcases h : nilpotencyLength L M with - | k
· exact bot_le
· rw [le_max_triv_iff_bracket_eq_bot]
rw [nilpotencyLength_eq_succ_iff R, lowerCentralSeries_succ] at h
exact h.1
theorem nontrivial_lowerCentralSeriesLast [LieModule R L M] [Nontrivial M] [IsNilpotent L M] :
Nontrivial (lowerCentralSeriesLast R L M) := by
rw [LieSubmodule.nontrivial_iff_ne_bot, lowerCentralSeriesLast]
cases h : nilpotencyLength L M
· rw [nilpotencyLength_eq_zero_iff, ← not_nontrivial_iff_subsingleton] at h
contradiction
· rw [nilpotencyLength_eq_succ_iff R] at h
exact h.2
theorem lowerCentralSeriesLast_le_of_not_isTrivial [IsNilpotent L M] (h : ¬ IsTrivial L M) :
lowerCentralSeriesLast R L M ≤ lowerCentralSeries R L M 1 := by
rw [lowerCentralSeriesLast]
replace h : 1 < nilpotencyLength L M := by
by_contra contra
have := isTrivial_of_nilpotencyLength_le_one L M (not_lt.mp contra)
contradiction
rcases hk : nilpotencyLength L M with - | k <;> rw [hk] at h
· contradiction
· exact antitone_lowerCentralSeries _ _ _ (Nat.lt_succ.mp h)
variable [LieModule R L M]
/-- For a nilpotent Lie module `M` of a Lie algebra `L`, the first term in the lower central series
of `M` contains a non-zero element on which `L` acts trivially unless the entire action is trivial.
Taking `M = L`, this provides a useful characterisation of Abelian-ness for nilpotent Lie
algebras. -/
lemma disjoint_lowerCentralSeries_maxTrivSubmodule_iff [IsNilpotent L M] :
Disjoint (lowerCentralSeries R L M 1) (maxTrivSubmodule R L M) ↔ IsTrivial L M := by
refine ⟨fun h ↦ ?_, fun h ↦ by simp⟩
nontriviality M
by_contra contra
have : lowerCentralSeriesLast R L M ≤ lowerCentralSeries R L M 1 ⊓ maxTrivSubmodule R L M :=
le_inf_iff.mpr ⟨lowerCentralSeriesLast_le_of_not_isTrivial R L M contra,
lowerCentralSeriesLast_le_max_triv R L M⟩
suffices ¬ Nontrivial (lowerCentralSeriesLast R L M) by
exact this (nontrivial_lowerCentralSeriesLast R L M)
rw [h.eq_bot, le_bot_iff] at this
exact this ▸ not_nontrivial _
theorem nontrivial_max_triv_of_isNilpotent [Nontrivial M] [IsNilpotent L M] :
Nontrivial (maxTrivSubmodule R L M) :=
Set.nontrivial_mono (lowerCentralSeriesLast_le_max_triv R L M)
(nontrivial_lowerCentralSeriesLast R L M)
@[simp]
theorem coe_lcs_range_toEnd_eq (k : ℕ) :
(lowerCentralSeries R (toEnd R L M).range M k : Submodule R M) =
lowerCentralSeries R L M k := by
induction k with
| zero => simp
| succ k ih =>
simp only [lowerCentralSeries_succ, LieSubmodule.lieIdeal_oper_eq_linear_span', ←
(lowerCentralSeries R (toEnd R L M).range M k).mem_toSubmodule, ih]
congr
ext m
constructor
· rintro ⟨⟨-, ⟨y, rfl⟩⟩, -, n, hn, rfl⟩
exact ⟨y, LieSubmodule.mem_top _, n, hn, rfl⟩
· rintro ⟨x, -, n, hn, rfl⟩
exact
⟨⟨toEnd R L M x, LieHom.mem_range_self _ x⟩, LieSubmodule.mem_top _, n, hn, rfl⟩
@[simp]
theorem isNilpotent_range_toEnd_iff :
IsNilpotent (toEnd R L M).range M ↔ IsNilpotent L M := by
simp only [isNilpotent_iff R _ M]
constructor <;> rintro ⟨k, hk⟩ <;> use k <;>
rw [← LieSubmodule.toSubmodule_inj] at hk ⊢ <;>
simpa using hk
end LieModule
namespace LieSubmodule
variable {N₁ N₂ : LieSubmodule R L M}
variable [LieModule R L M]
/-- The upper (aka ascending) central series.
See also `LieSubmodule.lcs`. -/
def ucs (k : ℕ) : LieSubmodule R L M → LieSubmodule R L M :=
normalizer^[k]
@[simp]
theorem ucs_zero : N.ucs 0 = N :=
rfl
@[simp]
theorem ucs_succ (k : ℕ) : N.ucs (k + 1) = (N.ucs k).normalizer :=
Function.iterate_succ_apply' normalizer k N
theorem ucs_add (k l : ℕ) : N.ucs (k + l) = (N.ucs l).ucs k :=
Function.iterate_add_apply normalizer k l N
@[gcongr, mono]
theorem ucs_mono (k : ℕ) (h : N₁ ≤ N₂) : N₁.ucs k ≤ N₂.ucs k := by
induction k with
| zero => simpa
| succ k ih =>
simp only [ucs_succ]
gcongr
theorem ucs_eq_self_of_normalizer_eq_self (h : N₁.normalizer = N₁) (k : ℕ) : N₁.ucs k = N₁ := by
induction k with
| zero => simp
| succ k ih => rwa [ucs_succ, ih]
/-- If a Lie module `M` contains a self-normalizing Lie submodule `N`, then all terms of the upper
central series of `M` are contained in `N`.
An important instance of this situation arises from a Cartan subalgebra `H ⊆ L` with the roles of
`L`, `M`, `N` played by `H`, `L`, `H`, respectively. -/
theorem ucs_le_of_normalizer_eq_self (h : N₁.normalizer = N₁) (k : ℕ) :
(⊥ : LieSubmodule R L M).ucs k ≤ N₁ := by
rw [← ucs_eq_self_of_normalizer_eq_self h k]
gcongr
simp
theorem lcs_add_le_iff (l k : ℕ) : N₁.lcs (l + k) ≤ N₂ ↔ N₁.lcs l ≤ N₂.ucs k := by
induction k generalizing l with
| zero => simp
| succ k ih =>
rw [(by abel : l + (k + 1) = l + 1 + k), ih, ucs_succ, lcs_succ, top_lie_le_iff_le_normalizer]
theorem lcs_le_iff (k : ℕ) : N₁.lcs k ≤ N₂ ↔ N₁ ≤ N₂.ucs k := by
convert lcs_add_le_iff (R := R) (L := L) (M := M) 0 k
rw [zero_add]
theorem gc_lcs_ucs (k : ℕ) :
GaloisConnection (fun N : LieSubmodule R L M => N.lcs k) fun N : LieSubmodule R L M =>
N.ucs k :=
fun _ _ => lcs_le_iff k
theorem ucs_eq_top_iff (k : ℕ) : N.ucs k = ⊤ ↔ LieModule.lowerCentralSeries R L M k ≤ N := by
rw [eq_top_iff, ← lcs_le_iff]; rfl
variable (R) in
theorem _root_.LieModule.isNilpotent_iff_exists_ucs_eq_top :
LieModule.IsNilpotent L M ↔ ∃ k, (⊥ : LieSubmodule R L M).ucs k = ⊤ := by
rw [LieModule.isNilpotent_iff R]; exact exists_congr fun k => by simp [ucs_eq_top_iff]
theorem ucs_comap_incl (k : ℕ) :
((⊥ : LieSubmodule R L M).ucs k).comap N.incl = (⊥ : LieSubmodule R L N).ucs k := by
induction k with
| zero => exact N.ker_incl
| succ k ih => simp [← ih]
theorem isNilpotent_iff_exists_self_le_ucs :
LieModule.IsNilpotent L N ↔ ∃ k, N ≤ (⊥ : LieSubmodule R L M).ucs k := by
simp_rw [LieModule.isNilpotent_iff_exists_ucs_eq_top R, ← ucs_comap_incl, comap_incl_eq_top]
theorem ucs_bot_one : (⊥ : LieSubmodule R L M).ucs 1 = LieModule.maxTrivSubmodule R L M := by
simp [LieSubmodule.normalizer_bot_eq_maxTrivSubmodule]
end LieSubmodule
section Morphisms
open LieModule Function
variable [LieModule R L M]
variable {L₂ M₂ : Type*} [LieRing L₂] [LieAlgebra R L₂]
variable [AddCommGroup M₂] [Module R M₂] [LieRingModule L₂ M₂]
variable {f : L →ₗ⁅R⁆ L₂} {g : M →ₗ[R] M₂}
variable (hfg : ∀ x m, ⁅f x, g m⁆ = g ⁅x, m⁆)
include hfg in
theorem lieModule_lcs_map_le (k : ℕ) :
(lowerCentralSeries R L M k : Submodule R M).map g ≤ lowerCentralSeries R L₂ M₂ k := by
induction k with
| zero =>
simp [LinearMap.range_eq_top, Submodule.map_top]
| succ k ih =>
rw [lowerCentralSeries_succ, LieSubmodule.lieIdeal_oper_eq_linear_span', Submodule.map_span,
Submodule.span_le]
rintro m₂ ⟨m, ⟨x, n, m_n, ⟨h₁, h₂⟩⟩, rfl⟩
simp only [lowerCentralSeries_succ, SetLike.mem_coe, LieSubmodule.mem_toSubmodule]
have : ∃ y : L₂, ∃ n : lowerCentralSeries R L₂ M₂ k, ⁅y, n⁆ = g m := by
use f x, ⟨g m_n, ih (Submodule.mem_map_of_mem h₁)⟩
simp [hfg x m_n, h₂]
obtain ⟨y, n, hn⟩ := this
rw [← hn]
apply LieSubmodule.lie_mem_lie
· simp
· exact SetLike.coe_mem n
variable [LieModule R L₂ M₂] (hg_inj : Injective g)
include hg_inj hfg in
theorem Function.Injective.lieModuleIsNilpotent [IsNilpotent L₂ M₂] : IsNilpotent L M := by
obtain ⟨k, hk⟩ := IsNilpotent.nilpotent R L₂ M₂
rw [isNilpotent_iff R]
use k
rw [← LieSubmodule.toSubmodule_inj] at hk ⊢
apply Submodule.map_injective_of_injective hg_inj
simpa [hk] using lieModule_lcs_map_le hfg k
| variable (hf_surj : Surjective f) (hg_surj : Surjective g)
include hf_surj hg_surj hfg in
theorem Function.Surjective.lieModule_lcs_map_eq (k : ℕ) :
(lowerCentralSeries R L M k : Submodule R M).map g = lowerCentralSeries R L₂ M₂ k := by
refine le_antisymm (lieModule_lcs_map_le hfg k) ?_
induction k with
| zero => simpa [LinearMap.range_eq_top]
| succ k ih =>
suffices
{m | ∃ (x : L₂) (n : _), n ∈ lowerCentralSeries R L M k ∧ ⁅x, g n⁆ = m} ⊆
g '' {m | ∃ (x : L) (n : _), n ∈ lowerCentralSeries R L M k ∧ ⁅x, n⁆ = m} by
simp only [← LieSubmodule.mem_toSubmodule] at this
simp_rw [lowerCentralSeries_succ, LieSubmodule.lieIdeal_oper_eq_linear_span',
Submodule.map_span, LieSubmodule.mem_top, true_and, ← LieSubmodule.mem_toSubmodule]
refine Submodule.span_mono (Set.Subset.trans ?_ this)
| Mathlib/Algebra/Lie/Nilpotent.lean | 657 | 672 |
/-
Copyright (c) 2018 Mario Carneiro. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Mario Carneiro, Floris van Doorn
-/
import Mathlib.Algebra.Order.Archimedean.Basic
import Mathlib.Algebra.Order.Group.Pointwise.Bounds
import Mathlib.Data.Real.Basic
import Mathlib.Order.ConditionallyCompleteLattice.Indexed
import Mathlib.Order.Interval.Set.Disjoint
/-!
# The real numbers are an Archimedean floor ring, and a conditionally complete linear order.
-/
assert_not_exists Finset
open Pointwise CauSeq
namespace Real
variable {ι : Sort*} {f : ι → ℝ} {s : Set ℝ} {a : ℝ}
instance instArchimedean : Archimedean ℝ :=
archimedean_iff_rat_le.2 fun x =>
Real.ind_mk x fun f =>
let ⟨M, _, H⟩ := f.bounded' 0
⟨M, mk_le_of_forall_le ⟨0, fun i _ => Rat.cast_le.2 <| le_of_lt (abs_lt.1 (H i)).2⟩⟩
noncomputable instance : FloorRing ℝ :=
Archimedean.floorRing _
theorem isCauSeq_iff_lift {f : ℕ → ℚ} : IsCauSeq abs f ↔ IsCauSeq abs fun i => (f i : ℝ) where
mp H ε ε0 :=
let ⟨δ, δ0, δε⟩ := exists_pos_rat_lt ε0
(H _ δ0).imp fun i hi j ij => by dsimp; exact lt_trans (mod_cast hi _ ij) δε
mpr H ε ε0 :=
(H _ (Rat.cast_pos.2 ε0)).imp fun i hi j ij => by dsimp at hi; exact mod_cast hi _ ij
theorem of_near (f : ℕ → ℚ) (x : ℝ) (h : ∀ ε > 0, ∃ i, ∀ j ≥ i, |(f j : ℝ) - x| < ε) :
∃ h', Real.mk ⟨f, h'⟩ = x :=
⟨isCauSeq_iff_lift.2 (CauSeq.of_near _ (const abs x) h),
sub_eq_zero.1 <|
abs_eq_zero.1 <|
(eq_of_le_of_forall_lt_imp_le_of_dense (abs_nonneg _)) fun _ε ε0 =>
mk_near_of_forall_near <| (h _ ε0).imp fun _i h j ij => le_of_lt (h j ij)⟩
theorem exists_floor (x : ℝ) : ∃ ub : ℤ, (ub : ℝ) ≤ x ∧ ∀ z : ℤ, (z : ℝ) ≤ x → z ≤ ub :=
Int.exists_greatest_of_bdd
(let ⟨n, hn⟩ := exists_int_gt x
⟨n, fun _ h' => Int.cast_le.1 <| le_trans h' <| le_of_lt hn⟩)
(let ⟨n, hn⟩ := exists_int_lt x
⟨n, le_of_lt hn⟩)
theorem exists_isLUB (hne : s.Nonempty) (hbdd : BddAbove s) : ∃ x, IsLUB s x := by
rcases hne, hbdd with ⟨⟨L, hL⟩, ⟨U, hU⟩⟩
have : ∀ d : ℕ, BddAbove { m : ℤ | ∃ y ∈ s, (m : ℝ) ≤ y * d } := by
obtain ⟨k, hk⟩ := exists_int_gt U
refine fun d => ⟨k * d, fun z h => ?_⟩
rcases h with ⟨y, yS, hy⟩
refine Int.cast_le.1 (hy.trans ?_)
push_cast
exact mul_le_mul_of_nonneg_right ((hU yS).trans hk.le) d.cast_nonneg
choose f hf using fun d : ℕ =>
Int.exists_greatest_of_bdd (this d) ⟨⌊L * d⌋, L, hL, Int.floor_le _⟩
have hf₁ : ∀ n > 0, ∃ y ∈ s, ((f n / n : ℚ) : ℝ) ≤ y := fun n n0 =>
let ⟨y, yS, hy⟩ := (hf n).1
⟨y, yS, by simpa using (div_le_iff₀ (Nat.cast_pos.2 n0 : (_ : ℝ) < _)).2 hy⟩
have hf₂ : ∀ n > 0, ∀ y ∈ s, (y - ((n : ℕ) : ℝ)⁻¹) < (f n / n : ℚ) := by
intro n n0 y yS
have := (Int.sub_one_lt_floor _).trans_le (Int.cast_le.2 <| (hf n).2 _ ⟨y, yS, Int.floor_le _⟩)
simp only [Rat.cast_div, Rat.cast_intCast, Rat.cast_natCast, gt_iff_lt]
rwa [lt_div_iff₀ (Nat.cast_pos.2 n0 : (_ : ℝ) < _), sub_mul, inv_mul_cancel₀]
exact ne_of_gt (Nat.cast_pos.2 n0)
have hg : IsCauSeq abs (fun n => f n / n : ℕ → ℚ) := by
intro ε ε0
suffices ∀ j ≥ ⌈ε⁻¹⌉₊, ∀ k ≥ ⌈ε⁻¹⌉₊, (f j / j - f k / k : ℚ) < ε by
refine ⟨_, fun j ij => abs_lt.2 ⟨?_, this _ ij _ le_rfl⟩⟩
rw [neg_lt, neg_sub]
exact this _ le_rfl _ ij
intro j ij k ik
replace ij := le_trans (Nat.le_ceil _) (Nat.cast_le.2 ij)
replace ik := le_trans (Nat.le_ceil _) (Nat.cast_le.2 ik)
have j0 := Nat.cast_pos.1 ((inv_pos.2 ε0).trans_le ij)
have k0 := Nat.cast_pos.1 ((inv_pos.2 ε0).trans_le ik)
rcases hf₁ _ j0 with ⟨y, yS, hy⟩
refine lt_of_lt_of_le ((Rat.cast_lt (K := ℝ)).1 ?_) ((inv_le_comm₀ ε0 (Nat.cast_pos.2 k0)).1 ik)
simpa using sub_lt_iff_lt_add'.2 (lt_of_le_of_lt hy <| sub_lt_iff_lt_add.1 <| hf₂ _ k0 _ yS)
let g : CauSeq ℚ abs := ⟨fun n => f n / n, hg⟩
refine ⟨mk g, ⟨fun x xS => ?_, fun y h => ?_⟩⟩
· refine le_of_forall_lt_imp_le_of_dense fun z xz => ?_
obtain ⟨K, hK⟩ := exists_nat_gt (x - z)⁻¹
refine le_mk_of_forall_le ⟨K, fun n nK => ?_⟩
replace xz := sub_pos.2 xz
replace hK := hK.le.trans (Nat.cast_le.2 nK)
have n0 : 0 < n := Nat.cast_pos.1 ((inv_pos.2 xz).trans_le hK)
refine le_trans ?_ (hf₂ _ n0 _ xS).le
rwa [le_sub_comm, inv_le_comm₀ (Nat.cast_pos.2 n0 : (_ : ℝ) < _) xz]
· exact
mk_le_of_forall_le
⟨1, fun n n1 =>
let ⟨x, xS, hx⟩ := hf₁ _ n1
le_trans hx (h xS)⟩
/-- A nonempty, bounded below set of real numbers has a greatest lower bound. -/
theorem exists_isGLB (hne : s.Nonempty) (hbdd : BddBelow s) : ∃ x, IsGLB s x := by
have hne' : (-s).Nonempty := Set.nonempty_neg.mpr hne
have hbdd' : BddAbove (-s) := bddAbove_neg.mpr hbdd
use -Classical.choose (Real.exists_isLUB hne' hbdd')
rw [← isLUB_neg]
exact Classical.choose_spec (Real.exists_isLUB hne' hbdd')
open scoped Classical in
noncomputable instance : SupSet ℝ :=
⟨fun s => if h : s.Nonempty ∧ BddAbove s then Classical.choose (exists_isLUB h.1 h.2) else 0⟩
open scoped Classical in
theorem sSup_def (s : Set ℝ) :
sSup s = if h : s.Nonempty ∧ BddAbove s then Classical.choose (exists_isLUB h.1 h.2) else 0 :=
rfl
protected theorem isLUB_sSup (h₁ : s.Nonempty) (h₂ : BddAbove s) : IsLUB s (sSup s) := by
simp only [sSup_def, dif_pos (And.intro h₁ h₂)]
apply Classical.choose_spec
noncomputable instance : InfSet ℝ :=
⟨fun s => -sSup (-s)⟩
theorem sInf_def (s : Set ℝ) : sInf s = -sSup (-s) := rfl
protected theorem isGLB_sInf (h₁ : s.Nonempty) (h₂ : BddBelow s) : IsGLB s (sInf s) := by
rw [sInf_def, ← isLUB_neg', neg_neg]
exact Real.isLUB_sSup h₁.neg h₂.neg
noncomputable instance : ConditionallyCompleteLinearOrder ℝ where
__ := Real.linearOrder
__ := Real.lattice
le_csSup s a hs ha := (Real.isLUB_sSup ⟨a, ha⟩ hs).1 ha
csSup_le s a hs ha := (Real.isLUB_sSup hs ⟨a, ha⟩).2 ha
csInf_le s a hs ha := (Real.isGLB_sInf ⟨a, ha⟩ hs).1 ha
le_csInf s a hs ha := (Real.isGLB_sInf hs ⟨a, ha⟩).2 ha
csSup_of_not_bddAbove s hs := by simp [hs, sSup_def]
csInf_of_not_bddBelow s hs := by simp [hs, sInf_def, sSup_def]
theorem lt_sInf_add_pos (h : s.Nonempty) {ε : ℝ} (hε : 0 < ε) : ∃ a ∈ s, a < sInf s + ε :=
exists_lt_of_csInf_lt h <| lt_add_of_pos_right _ hε
theorem add_neg_lt_sSup (h : s.Nonempty) {ε : ℝ} (hε : ε < 0) : ∃ a ∈ s, sSup s + ε < a :=
exists_lt_of_lt_csSup h <| add_lt_iff_neg_left.2 hε
theorem sInf_le_iff (h : BddBelow s) (h' : s.Nonempty) :
sInf s ≤ a ↔ ∀ ε, 0 < ε → ∃ x ∈ s, x < a + ε := by
rw [le_iff_forall_pos_lt_add]
constructor <;> intro H ε ε_pos
· exact exists_lt_of_csInf_lt h' (H ε ε_pos)
· rcases H ε ε_pos with ⟨x, x_in, hx⟩
exact csInf_lt_of_lt h x_in hx
theorem le_sSup_iff (h : BddAbove s) (h' : s.Nonempty) :
a ≤ sSup s ↔ ∀ ε, ε < 0 → ∃ x ∈ s, a + ε < x := by
rw [le_iff_forall_pos_lt_add]
refine ⟨fun H ε ε_neg => ?_, fun H ε ε_pos => ?_⟩
· exact exists_lt_of_lt_csSup h' (lt_sub_iff_add_lt.mp (H _ (neg_pos.mpr ε_neg)))
· rcases H _ (neg_lt_zero.mpr ε_pos) with ⟨x, x_in, hx⟩
exact sub_lt_iff_lt_add.mp (lt_csSup_of_lt h x_in hx)
@[simp]
theorem sSup_empty : sSup (∅ : Set ℝ) = 0 :=
dif_neg <| by simp
@[simp] lemma iSup_of_isEmpty [IsEmpty ι] (f : ι → ℝ) : ⨆ i, f i = 0 := by
dsimp [iSup]
convert Real.sSup_empty
rw [Set.range_eq_empty_iff]
infer_instance
@[simp]
theorem iSup_const_zero : ⨆ _ : ι, (0 : ℝ) = 0 := by
cases isEmpty_or_nonempty ι
· exact Real.iSup_of_isEmpty _
· exact ciSup_const
lemma sSup_of_not_bddAbove (hs : ¬BddAbove s) : sSup s = 0 := dif_neg fun h => hs h.2
lemma iSup_of_not_bddAbove (hf : ¬BddAbove (Set.range f)) : ⨆ i, f i = 0 := sSup_of_not_bddAbove hf
theorem sSup_univ : sSup (@Set.univ ℝ) = 0 := Real.sSup_of_not_bddAbove not_bddAbove_univ
@[simp]
theorem sInf_empty : sInf (∅ : Set ℝ) = 0 := by simp [sInf_def, sSup_empty]
@[simp] nonrec lemma iInf_of_isEmpty [IsEmpty ι] (f : ι → ℝ) : ⨅ i, f i = 0 := by
rw [iInf_of_isEmpty, sInf_empty]
@[simp]
theorem iInf_const_zero : ⨅ _ : ι, (0 : ℝ) = 0 := by
cases isEmpty_or_nonempty ι
· exact Real.iInf_of_isEmpty _
· exact ciInf_const
theorem sInf_of_not_bddBelow (hs : ¬BddBelow s) : sInf s = 0 :=
neg_eq_zero.2 <| sSup_of_not_bddAbove <| mt bddAbove_neg.1 hs
theorem iInf_of_not_bddBelow (hf : ¬BddBelow (Set.range f)) : ⨅ i, f i = 0 :=
sInf_of_not_bddBelow hf
/-- As `sSup s = 0` when `s` is an empty set of reals, it suffices to show that all elements of `s`
are at most some nonnegative number `a` to show that `sSup s ≤ a`.
See also `csSup_le`. -/
protected lemma sSup_le (hs : ∀ x ∈ s, x ≤ a) (ha : 0 ≤ a) : sSup s ≤ a := by
obtain rfl | hs' := s.eq_empty_or_nonempty
exacts [sSup_empty.trans_le ha, csSup_le hs' hs]
/-- As `⨆ i, f i = 0` when the domain of the real-valued function `f` is empty, it suffices to show
that all values of `f` are at most some nonnegative number `a` to show that `⨆ i, f i ≤ a`.
See also `ciSup_le`. -/
protected lemma iSup_le (hf : ∀ i, f i ≤ a) (ha : 0 ≤ a) : ⨆ i, f i ≤ a :=
Real.sSup_le (Set.forall_mem_range.2 hf) ha
/-- As `sInf s = 0` when `s` is an empty set of reals, it suffices to show that all elements of `s`
are at least some nonpositive number `a` to show that `a ≤ sInf s`.
|
See also `le_csInf`. -/
protected lemma le_sInf (hs : ∀ x ∈ s, a ≤ x) (ha : a ≤ 0) : a ≤ sInf s := by
obtain rfl | hs' := s.eq_empty_or_nonempty
| Mathlib/Data/Real/Archimedean.lean | 223 | 226 |
/-
Copyright (c) 2021 Shing Tak Lam. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Shing Tak Lam
-/
import Mathlib.CategoryTheory.Category.Grpd
import Mathlib.CategoryTheory.Groupoid
import Mathlib.Topology.Category.TopCat.Basic
import Mathlib.Topology.Homotopy.Path
import Mathlib.Data.Set.Subsingleton
/-!
# Fundamental groupoid of a space
Given a topological space `X`, we can define the fundamental groupoid of `X` to be the category with
objects being points of `X`, and morphisms `x ⟶ y` being paths from `x` to `y`, quotiented by
homotopy equivalence. With this, the fundamental group of `X` based at `x` is just the automorphism
group of `x`.
-/
open CategoryTheory
universe u
variable {X : Type u} [TopologicalSpace X]
variable {x₀ x₁ : X}
noncomputable section
open unitInterval
namespace Path
namespace Homotopy
section
/-- Auxiliary function for `reflTransSymm`. -/
def reflTransSymmAux (x : I × I) : ℝ :=
if (x.2 : ℝ) ≤ 1 / 2 then x.1 * 2 * x.2 else x.1 * (2 - 2 * x.2)
@[continuity, fun_prop]
theorem continuous_reflTransSymmAux : Continuous reflTransSymmAux := by
refine continuous_if_le ?_ ?_ (Continuous.continuousOn ?_) (Continuous.continuousOn ?_) ?_
· fun_prop
· fun_prop
· fun_prop
· fun_prop
intro x hx
norm_num [hx, mul_assoc]
theorem reflTransSymmAux_mem_I (x : I × I) : reflTransSymmAux x ∈ I := by
dsimp only [reflTransSymmAux]
split_ifs
· constructor
· apply mul_nonneg
· apply mul_nonneg
· unit_interval
· norm_num
· unit_interval
· rw [mul_assoc]
apply mul_le_one₀
· unit_interval
· apply mul_nonneg
· norm_num
· unit_interval
· linarith
· constructor
· apply mul_nonneg
· unit_interval
linarith [unitInterval.nonneg x.2, unitInterval.le_one x.2]
· apply mul_le_one₀
· unit_interval
· linarith [unitInterval.nonneg x.2, unitInterval.le_one x.2]
· linarith [unitInterval.nonneg x.2, unitInterval.le_one x.2]
/-- For any path `p` from `x₀` to `x₁`, we have a homotopy from the constant path based at `x₀` to
`p.trans p.symm`. -/
def reflTransSymm (p : Path x₀ x₁) : Homotopy (Path.refl x₀) (p.trans p.symm) where
toFun x := p ⟨reflTransSymmAux x, reflTransSymmAux_mem_I x⟩
continuous_toFun := by fun_prop
map_zero_left := by simp [reflTransSymmAux]
map_one_left x := by
dsimp only [reflTransSymmAux, Path.coe_toContinuousMap, Path.trans]
change _ = ite _ _ _
split_ifs with h
· rw [Path.extend, Set.IccExtend_of_mem]
· norm_num
· rw [unitInterval.mul_pos_mem_iff zero_lt_two]
exact ⟨unitInterval.nonneg x, h⟩
· rw [Path.symm, Path.extend, Set.IccExtend_of_mem]
· simp only [Set.Icc.coe_one, one_mul, coe_mk_mk, Function.comp_apply]
congr 1
ext
norm_num [sub_sub_eq_add_sub]
· rw [unitInterval.two_mul_sub_one_mem_iff]
exact ⟨(not_le.1 h).le, unitInterval.le_one x⟩
prop' t x hx := by
simp only [Set.mem_singleton_iff, Set.mem_insert_iff] at hx
simp only [ContinuousMap.coe_mk, coe_toContinuousMap, Path.refl_apply]
cases hx with
| inl hx
| inr hx =>
rw [hx]
norm_num [reflTransSymmAux]
/-- For any path `p` from `x₀` to `x₁`, we have a homotopy from the constant path based at `x₁` to
`p.symm.trans p`. -/
def reflSymmTrans (p : Path x₀ x₁) : Homotopy (Path.refl x₁) (p.symm.trans p) :=
(reflTransSymm p.symm).cast rfl <| congr_arg _ (Path.symm_symm _)
end
section TransRefl
/-- Auxiliary function for `trans_refl_reparam`. -/
def transReflReparamAux (t : I) : ℝ :=
if (t : ℝ) ≤ 1 / 2 then 2 * t else 1
@[continuity, fun_prop]
theorem continuous_transReflReparamAux : Continuous transReflReparamAux := by
refine continuous_if_le ?_ ?_ (Continuous.continuousOn ?_) (Continuous.continuousOn ?_) ?_ <;>
[fun_prop; fun_prop; fun_prop; fun_prop; skip]
intro x hx
simp [hx]
theorem transReflReparamAux_mem_I (t : I) : transReflReparamAux t ∈ I := by
unfold transReflReparamAux
split_ifs <;> constructor <;> linarith [unitInterval.le_one t, unitInterval.nonneg t]
theorem transReflReparamAux_zero : transReflReparamAux 0 = 0 := by
norm_num [transReflReparamAux]
theorem transReflReparamAux_one : transReflReparamAux 1 = 1 := by
norm_num [transReflReparamAux]
theorem trans_refl_reparam (p : Path x₀ x₁) :
p.trans (Path.refl x₁) =
p.reparam (fun t => ⟨transReflReparamAux t, transReflReparamAux_mem_I t⟩) (by fun_prop)
(Subtype.ext transReflReparamAux_zero) (Subtype.ext transReflReparamAux_one) := by
ext
unfold transReflReparamAux
simp only [Path.trans_apply, not_le, coe_reparam, Function.comp_apply, one_div, Path.refl_apply]
split_ifs
· rfl
· rfl
· simp
· simp
/-- For any path `p` from `x₀` to `x₁`, we have a homotopy from `p.trans (Path.refl x₁)` to `p`. -/
| def transRefl (p : Path x₀ x₁) : Homotopy (p.trans (Path.refl x₁)) p :=
((Homotopy.reparam p (fun t => ⟨transReflReparamAux t, transReflReparamAux_mem_I t⟩)
(by fun_prop) (Subtype.ext transReflReparamAux_zero)
(Subtype.ext transReflReparamAux_one)).cast
rfl (trans_refl_reparam p).symm).symm
/-- For any path `p` from `x₀` to `x₁`, we have a homotopy from `(Path.refl x₀).trans p` to `p`. -/
def reflTrans (p : Path x₀ x₁) : Homotopy ((Path.refl x₀).trans p) p :=
(transRefl p.symm).symm₂.cast (by simp) (by simp)
end TransRefl
| Mathlib/AlgebraicTopology/FundamentalGroupoid/Basic.lean | 151 | 162 |
/-
Copyright (c) 2021 Kalle Kytölä. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Kalle Kytölä
-/
import Mathlib.MeasureTheory.Integral.Bochner.ContinuousLinearMap
import Mathlib.MeasureTheory.Measure.HasOuterApproxClosed
import Mathlib.MeasureTheory.Measure.Prod
import Mathlib.Topology.Algebra.Module.WeakDual
/-!
# Finite measures
This file defines the type of finite measures on a given measurable space. When the underlying
space has a topology and the measurable space structure (sigma algebra) is finer than the Borel
sigma algebra, then the type of finite measures is equipped with the topology of weak convergence
of measures. The topology of weak convergence is the coarsest topology w.r.t. which
for every bounded continuous `ℝ≥0`-valued function `f`, the integration of `f` against the
measure is continuous.
## Main definitions
The main definitions are
* `MeasureTheory.FiniteMeasure Ω`: The type of finite measures on `Ω` with the topology of weak
convergence of measures.
* `MeasureTheory.FiniteMeasure.toWeakDualBCNN : FiniteMeasure Ω → (WeakDual ℝ≥0 (Ω →ᵇ ℝ≥0))`:
Interpret a finite measure as a continuous linear functional on the space of
bounded continuous nonnegative functions on `Ω`. This is used for the definition of the
topology of weak convergence.
* `MeasureTheory.FiniteMeasure.map`: The push-forward `f* μ` of a finite measure `μ` on `Ω`
along a measurable function `f : Ω → Ω'`.
* `MeasureTheory.FiniteMeasure.mapCLM`: The push-forward along a given continuous `f : Ω → Ω'`
as a continuous linear map `f* : FiniteMeasure Ω →L[ℝ≥0] FiniteMeasure Ω'`.
## Main results
* Finite measures `μ` on `Ω` give rise to continuous linear functionals on the space of
bounded continuous nonnegative functions on `Ω` via integration:
`MeasureTheory.FiniteMeasure.toWeakDualBCNN : FiniteMeasure Ω → (WeakDual ℝ≥0 (Ω →ᵇ ℝ≥0))`
* `MeasureTheory.FiniteMeasure.tendsto_iff_forall_integral_tendsto`: Convergence of finite
measures is characterized by the convergence of integrals of all bounded continuous functions.
This shows that the chosen definition of topology coincides with the common textbook definition
of weak convergence of measures. A similar characterization by the convergence of integrals (in
the `MeasureTheory.lintegral` sense) of all bounded continuous nonnegative functions is
`MeasureTheory.FiniteMeasure.tendsto_iff_forall_lintegral_tendsto`.
* `MeasureTheory.FiniteMeasure.continuous_map`: For a continuous function `f : Ω → Ω'`, the
push-forward of finite measures `f* : FiniteMeasure Ω → FiniteMeasure Ω'` is continuous.
* `MeasureTheory.FiniteMeasure.t2Space`: The topology of weak convergence of finite Borel measures
is Hausdorff on spaces where indicators of closed sets have continuous decreasing approximating
sequences (in particular on any pseudo-metrizable spaces).
## Implementation notes
The topology of weak convergence of finite Borel measures is defined using a mapping from
`MeasureTheory.FiniteMeasure Ω` to `WeakDual ℝ≥0 (Ω →ᵇ ℝ≥0)`, inheriting the topology from the
latter.
The implementation of `MeasureTheory.FiniteMeasure Ω` and is directly as a subtype of
`MeasureTheory.Measure Ω`, and the coercion to a function is the composition `ENNReal.toNNReal`
and the coercion to function of `MeasureTheory.Measure Ω`. Another alternative would have been to
use a bijection with `MeasureTheory.VectorMeasure Ω ℝ≥0` as an intermediate step. Some
considerations:
* Potential advantages of using the `NNReal`-valued vector measure alternative:
* The coercion to function would avoid need to compose with `ENNReal.toNNReal`, the
`NNReal`-valued API could be more directly available.
* Potential drawbacks of the vector measure alternative:
* The coercion to function would lose monotonicity, as non-measurable sets would be defined to
have measure 0.
* No integration theory directly. E.g., the topology definition requires
`MeasureTheory.lintegral` w.r.t. a coercion to `MeasureTheory.Measure Ω` in any case.
## References
* [Billingsley, *Convergence of probability measures*][billingsley1999]
## Tags
weak convergence of measures, finite measure
-/
noncomputable section
open BoundedContinuousFunction Filter MeasureTheory Set Topology
open scoped ENNReal NNReal
namespace MeasureTheory
namespace FiniteMeasure
section FiniteMeasure
/-! ### Finite measures
In this section we define the `Type` of `MeasureTheory.FiniteMeasure Ω`, when `Ω` is a measurable
space. Finite measures on `Ω` are a module over `ℝ≥0`.
If `Ω` is moreover a topological space and the sigma algebra on `Ω` is finer than the Borel sigma
algebra (i.e. `[OpensMeasurableSpace Ω]`), then `MeasureTheory.FiniteMeasure Ω` is equipped with
the topology of weak convergence of measures. This is implemented by defining a pairing of finite
measures `μ` on `Ω` with continuous bounded nonnegative functions `f : Ω →ᵇ ℝ≥0` via integration,
and using the associated weak topology (essentially the weak-star topology on the dual of
`Ω →ᵇ ℝ≥0`).
-/
variable {Ω : Type*} [MeasurableSpace Ω]
/-- Finite measures are defined as the subtype of measures that have the property of being finite
measures (i.e., their total mass is finite). -/
def _root_.MeasureTheory.FiniteMeasure (Ω : Type*) [MeasurableSpace Ω] : Type _ :=
{ μ : Measure Ω // IsFiniteMeasure μ }
/-- Coercion from `MeasureTheory.FiniteMeasure Ω` to `MeasureTheory.Measure Ω`. -/
@[coe]
def toMeasure : FiniteMeasure Ω → Measure Ω := Subtype.val
/-- A finite measure can be interpreted as a measure. -/
instance instCoe : Coe (FiniteMeasure Ω) (MeasureTheory.Measure Ω) := { coe := toMeasure }
instance isFiniteMeasure (μ : FiniteMeasure Ω) : IsFiniteMeasure (μ : Measure Ω) := μ.prop
@[simp]
theorem val_eq_toMeasure (ν : FiniteMeasure Ω) : ν.val = (ν : Measure Ω) := rfl
theorem toMeasure_injective : Function.Injective ((↑) : FiniteMeasure Ω → Measure Ω) :=
Subtype.coe_injective
instance instFunLike : FunLike (FiniteMeasure Ω) (Set Ω) ℝ≥0 where
coe μ s := ((μ : Measure Ω) s).toNNReal
coe_injective' μ ν h := toMeasure_injective <| Measure.ext fun s _ ↦ by
simpa [ENNReal.toNNReal_eq_toNNReal_iff, measure_ne_top] using congr_fun h s
lemma coeFn_def (μ : FiniteMeasure Ω) : μ = fun s ↦ ((μ : Measure Ω) s).toNNReal := rfl
lemma coeFn_mk (μ : Measure Ω) (hμ) :
DFunLike.coe (F := FiniteMeasure Ω) ⟨μ, hμ⟩ = fun s ↦ (μ s).toNNReal := rfl
@[simp, norm_cast]
lemma mk_apply (μ : Measure Ω) (hμ) (s : Set Ω) :
DFunLike.coe (F := FiniteMeasure Ω) ⟨μ, hμ⟩ s = (μ s).toNNReal := rfl
@[simp]
theorem ennreal_coeFn_eq_coeFn_toMeasure (ν : FiniteMeasure Ω) (s : Set Ω) :
(ν s : ℝ≥0∞) = (ν : Measure Ω) s :=
ENNReal.coe_toNNReal (measure_lt_top (↑ν) s).ne
@[simp]
theorem null_iff_toMeasure_null (ν : FiniteMeasure Ω) (s : Set Ω) :
ν s = 0 ↔ (ν : Measure Ω) s = 0 :=
⟨fun h ↦ by rw [← ennreal_coeFn_eq_coeFn_toMeasure, h, ENNReal.coe_zero],
fun h ↦ congrArg ENNReal.toNNReal h⟩
theorem apply_mono (μ : FiniteMeasure Ω) {s₁ s₂ : Set Ω} (h : s₁ ⊆ s₂) : μ s₁ ≤ μ s₂ :=
ENNReal.toNNReal_mono (measure_ne_top _ s₂) ((μ : Measure Ω).mono h)
/-- Continuity from below: the measure of the union of a sequence of (not necessarily measurable)
sets is the limit of the measures of the partial unions. -/
protected lemma tendsto_measure_iUnion_accumulate {ι : Type*} [Preorder ι]
[IsCountablyGenerated (atTop : Filter ι)] {μ : FiniteMeasure Ω} {f : ι → Set Ω} :
Tendsto (fun i ↦ μ (Accumulate f i)) atTop (𝓝 (μ (⋃ i, f i))) := by
simpa [← ennreal_coeFn_eq_coeFn_toMeasure]
using tendsto_measure_iUnion_accumulate (μ := μ.toMeasure) (ι := ι)
/-- The (total) mass of a finite measure `μ` is `μ univ`, i.e., the cast to `NNReal` of
`(μ : measure Ω) univ`. -/
def mass (μ : FiniteMeasure Ω) : ℝ≥0 := μ univ
@[simp] theorem apply_le_mass (μ : FiniteMeasure Ω) (s : Set Ω) : μ s ≤ μ.mass := by
simpa using apply_mono μ (subset_univ s)
@[simp]
theorem ennreal_mass {μ : FiniteMeasure Ω} : (μ.mass : ℝ≥0∞) = (μ : Measure Ω) univ :=
ennreal_coeFn_eq_coeFn_toMeasure μ Set.univ
instance instZero : Zero (FiniteMeasure Ω) where zero := ⟨0, MeasureTheory.isFiniteMeasureZero⟩
@[simp, norm_cast] lemma coeFn_zero : ⇑(0 : FiniteMeasure Ω) = 0 := rfl
@[simp]
theorem zero_mass : (0 : FiniteMeasure Ω).mass = 0 := rfl
@[simp]
theorem mass_zero_iff (μ : FiniteMeasure Ω) : μ.mass = 0 ↔ μ = 0 := by
refine ⟨fun μ_mass => ?_, fun hμ => by simp only [hμ, zero_mass]⟩
apply toMeasure_injective
apply Measure.measure_univ_eq_zero.mp
rwa [← ennreal_mass, ENNReal.coe_eq_zero]
theorem mass_nonzero_iff (μ : FiniteMeasure Ω) : μ.mass ≠ 0 ↔ μ ≠ 0 :=
not_iff_not.mpr <| FiniteMeasure.mass_zero_iff μ
@[ext]
theorem eq_of_forall_toMeasure_apply_eq (μ ν : FiniteMeasure Ω)
(h : ∀ s : Set Ω, MeasurableSet s → (μ : Measure Ω) s = (ν : Measure Ω) s) : μ = ν := by
apply Subtype.ext
ext1 s s_mble
exact h s s_mble
|
theorem eq_of_forall_apply_eq (μ ν : FiniteMeasure Ω)
(h : ∀ s : Set Ω, MeasurableSet s → μ s = ν s) : μ = ν := by
ext1 s s_mble
simpa [ennreal_coeFn_eq_coeFn_toMeasure] using congr_arg ((↑) : ℝ≥0 → ℝ≥0∞) (h s s_mble)
| Mathlib/MeasureTheory/Measure/FiniteMeasure.lean | 200 | 204 |
/-
Copyright (c) 2022 Kim Morrison. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Kim Morrison, Oleksandr Manzyuk
-/
import Mathlib.CategoryTheory.Bicategory.Basic
import Mathlib.CategoryTheory.Monoidal.Mon_
import Mathlib.CategoryTheory.Limits.Preserves.Shapes.Equalizers
/-!
# The category of bimodule objects over a pair of monoid objects.
-/
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
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
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
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
end
end
/-- A bimodule object for a pair of monoid objects, all internal to some monoidal category. -/
structure Bimod (A B : Mon_ C) where
/-- The underlying monoidal category -/
X : C
/-- The left action of this bimodule object -/
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
/-- The right action of this bimodule object -/
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
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)
/-- A morphism of bimodule objects. -/
@[ext]
structure Hom (M N : Bimod A B) where
/-- The morphism between `M`'s monoidal category and `N`'s monoidal category -/
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
attribute [reassoc (attr := simp)] Hom.left_act_hom Hom.right_act_hom
/-- The identity morphism on a bimodule object. -/
@[simps]
def id' (M : Bimod A B) : Hom M M where hom := 𝟙 M.X
instance homInhabited (M : Bimod A B) : Inhabited (Hom M M) :=
⟨id' M⟩
/-- Composition of bimodule object morphisms. -/
@[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
instance : Category (Bimod A B) where
Hom M N := Hom M N
id := id'
comp f g := comp f g
@[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
@[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
/-- Construct an isomorphism of bimodules by giving an isomorphism between the underlying objects
and checking compatibility with left and right actions only in the forward direction.
-/
@[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]
variable (A)
/-- A monoid object as a bimodule over itself. -/
@[simps]
def regular : Bimod A A where
X := A.X
actLeft := A.mul
actRight := A.mul
instance : Inhabited (Bimod A A) :=
⟨regular A⟩
/-- The forgetful functor from bimodule objects to the ambient category. -/
def forget : Bimod A B ⥤ C where
obj A := A.X
map f := f.hom
open CategoryTheory.Limits
variable [HasCoequalizers C]
namespace TensorBimod
variable {R S T : Mon_ C} (P : Bimod R S) (Q : Bimod S T)
/-- The underlying object of the tensor product of two bimodules. -/
noncomputable def X : C :=
coequalizer (P.actRight ▷ Q.X) ((α_ _ _ _).hom ≫ (P.X ◁ Q.actLeft))
section
variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)]
/-- Left action for the tensor product of two bimodules. -/
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]
monoidal)
(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]
monoidal))
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]
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]
monoidal
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]
monoidal
end
section
variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)]
/-- Right action for the tensor product of two bimodules. -/
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))
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]
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
theorem right_assoc' :
(_ ◁ T.mul) ≫ actRight P Q =
(α_ _ T.X T.X).inv ≫ (actRight P Q ▷ T.X) ≫ actRight P Q := by
refine (cancel_epi ((tensorRight _).map (coequalizer.π _ _))).1 ?_
dsimp [X]
-- Porting note: had to replace some `rw` by `erw`
slice_lhs 1 2 => rw [← 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, right_assoc,
MonoidalCategory.whiskerLeft_comp, MonoidalCategory.whiskerLeft_comp]
slice_rhs 1 2 => rw [associator_inv_naturality_left]
slice_rhs 2 3 => rw [← comp_whiskerRight, π_tensor_id_actRight, comp_whiskerRight,
comp_whiskerRight]
slice_rhs 4 5 => rw [π_tensor_id_actRight]
simp
end
section
variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)]
variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)]
theorem middle_assoc' :
(actLeft P Q ▷ T.X) ≫ actRight P Q =
(α_ R.X _ T.X).hom ≫ (R.X ◁ actRight P Q) ≫ actLeft P Q := by
refine (cancel_epi ((tensorLeft _ ⋙ tensorRight _).map (coequalizer.π _ _))).1 ?_
dsimp [X]
slice_lhs 1 2 => rw [← comp_whiskerRight, whiskerLeft_π_actLeft, comp_whiskerRight,
comp_whiskerRight]
slice_lhs 3 4 => rw [π_tensor_id_actRight]
slice_lhs 2 3 => rw [associator_naturality_left]
-- Porting note: had to replace `rw` by `erw`
slice_rhs 1 2 => rw [associator_naturality_middle]
slice_rhs 2 3 => rw [← MonoidalCategory.whiskerLeft_comp, π_tensor_id_actRight,
MonoidalCategory.whiskerLeft_comp, MonoidalCategory.whiskerLeft_comp]
slice_rhs 4 5 => rw [whiskerLeft_π_actLeft]
slice_rhs 3 4 => rw [associator_inv_naturality_right]
slice_rhs 4 5 => rw [whisker_exchange]
simp
end
end TensorBimod
section
variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)]
variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)]
/-- Tensor product of two bimodule objects as a bimodule object. -/
@[simps]
noncomputable def tensorBimod {X Y Z : Mon_ C} (M : Bimod X Y) (N : Bimod Y Z) : Bimod X Z where
X := TensorBimod.X M N
actLeft := TensorBimod.actLeft M N
actRight := TensorBimod.actRight M N
one_actLeft := TensorBimod.one_act_left' M N
actRight_one := TensorBimod.actRight_one' M N
left_assoc := TensorBimod.left_assoc' M N
right_assoc := TensorBimod.right_assoc' M N
middle_assoc := TensorBimod.middle_assoc' M N
/-- Left whiskering for morphisms of bimodule objects. -/
@[simps]
noncomputable def whiskerLeft {X Y Z : Mon_ C} (M : Bimod X Y) {N₁ N₂ : Bimod Y Z} (f : N₁ ⟶ N₂) :
M.tensorBimod N₁ ⟶ M.tensorBimod N₂ where
hom :=
colimMap
(parallelPairHom _ _ _ _ (_ ◁ f.hom) (_ ◁ f.hom)
(by rw [whisker_exchange])
(by
simp only [Category.assoc, tensor_whiskerLeft, Iso.inv_hom_id_assoc,
Iso.cancel_iso_hom_left]
slice_lhs 1 2 => rw [← MonoidalCategory.whiskerLeft_comp, Hom.left_act_hom]
simp))
left_act_hom := by
refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_
dsimp
slice_lhs 1 2 => rw [TensorBimod.whiskerLeft_π_actLeft]
slice_lhs 3 4 => rw [ι_colimMap, parallelPairHom_app_one]
slice_rhs 1 2 => rw [← MonoidalCategory.whiskerLeft_comp, ι_colimMap, parallelPairHom_app_one,
MonoidalCategory.whiskerLeft_comp]
slice_rhs 2 3 => rw [TensorBimod.whiskerLeft_π_actLeft]
slice_rhs 1 2 => rw [associator_inv_naturality_right]
slice_rhs 2 3 => rw [whisker_exchange]
simp
right_act_hom := by
refine (cancel_epi ((tensorRight _).map (coequalizer.π _ _))).1 ?_
dsimp
slice_lhs 1 2 => rw [TensorBimod.π_tensor_id_actRight]
slice_lhs 3 4 => rw [ι_colimMap, parallelPairHom_app_one]
slice_lhs 2 3 => rw [← MonoidalCategory.whiskerLeft_comp, Hom.right_act_hom]
slice_rhs 1 2 =>
rw [← comp_whiskerRight, ι_colimMap, parallelPairHom_app_one, comp_whiskerRight]
slice_rhs 2 3 => rw [TensorBimod.π_tensor_id_actRight]
simp
/-- Right whiskering for morphisms of bimodule objects. -/
@[simps]
noncomputable def whiskerRight {X Y Z : Mon_ C} {M₁ M₂ : Bimod X Y} (f : M₁ ⟶ M₂) (N : Bimod Y Z) :
M₁.tensorBimod N ⟶ M₂.tensorBimod N where
hom :=
colimMap
(parallelPairHom _ _ _ _ (f.hom ▷ _ ▷ _) (f.hom ▷ _)
(by rw [← comp_whiskerRight, Hom.right_act_hom, comp_whiskerRight])
(by
slice_lhs 2 3 => rw [whisker_exchange]
simp))
left_act_hom := by
refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_
dsimp
slice_lhs 1 2 => rw [TensorBimod.whiskerLeft_π_actLeft]
slice_lhs 3 4 => rw [ι_colimMap, parallelPairHom_app_one]
slice_lhs 2 3 => rw [← comp_whiskerRight, Hom.left_act_hom]
slice_rhs 1 2 => rw [← MonoidalCategory.whiskerLeft_comp, ι_colimMap, parallelPairHom_app_one,
MonoidalCategory.whiskerLeft_comp]
slice_rhs 2 3 => rw [TensorBimod.whiskerLeft_π_actLeft]
slice_rhs 1 2 => rw [associator_inv_naturality_middle]
simp
right_act_hom := by
refine (cancel_epi ((tensorRight _).map (coequalizer.π _ _))).1 ?_
dsimp
slice_lhs 1 2 => rw [TensorBimod.π_tensor_id_actRight]
slice_lhs 3 4 => rw [ι_colimMap, parallelPairHom_app_one]
slice_lhs 2 3 => rw [whisker_exchange]
slice_rhs 1 2 => rw [← comp_whiskerRight, ι_colimMap, parallelPairHom_app_one,
comp_whiskerRight]
slice_rhs 2 3 => rw [TensorBimod.π_tensor_id_actRight]
simp
end
namespace AssociatorBimod
variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)]
variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)]
variable {R S T U : Mon_ C} (P : Bimod R S) (Q : Bimod S T) (L : Bimod T U)
/-- An auxiliary morphism for the definition of the underlying morphism of the forward component of
the associator isomorphism. -/
noncomputable def homAux : (P.tensorBimod Q).X ⊗ L.X ⟶ (P.tensorBimod (Q.tensorBimod L)).X :=
(PreservesCoequalizer.iso (tensorRight L.X) _ _).inv ≫
coequalizer.desc ((α_ _ _ _).hom ≫ (P.X ◁ coequalizer.π _ _) ≫ coequalizer.π _ _)
(by
dsimp; dsimp [TensorBimod.X]
slice_lhs 1 2 => rw [associator_naturality_left]
slice_lhs 2 3 => rw [← whisker_exchange]
slice_lhs 3 4 => rw [coequalizer.condition]
slice_lhs 2 3 => rw [associator_naturality_right]
slice_lhs 3 4 =>
rw [← MonoidalCategory.whiskerLeft_comp,
TensorBimod.whiskerLeft_π_actLeft, MonoidalCategory.whiskerLeft_comp]
simp)
/-- The underlying morphism of the forward component of the associator isomorphism. -/
noncomputable def hom :
((P.tensorBimod Q).tensorBimod L).X ⟶ (P.tensorBimod (Q.tensorBimod L)).X :=
coequalizer.desc (homAux P Q L)
(by
dsimp [homAux]
refine (cancel_epi ((tensorRight _ ⋙ tensorRight _).map (coequalizer.π _ _))).1 ?_
dsimp [TensorBimod.X]
slice_lhs 1 2 => rw [← comp_whiskerRight, TensorBimod.π_tensor_id_actRight,
comp_whiskerRight, comp_whiskerRight]
slice_lhs 3 5 => rw [π_tensor_id_preserves_coequalizer_inv_desc]
slice_lhs 2 3 => rw [associator_naturality_middle]
slice_lhs 3 4 =>
rw [← MonoidalCategory.whiskerLeft_comp, coequalizer.condition,
MonoidalCategory.whiskerLeft_comp, MonoidalCategory.whiskerLeft_comp]
slice_rhs 1 2 => rw [associator_naturality_left]
slice_rhs 2 3 => rw [← whisker_exchange]
slice_rhs 3 5 => rw [π_tensor_id_preserves_coequalizer_inv_desc]
simp)
theorem hom_left_act_hom' :
((P.tensorBimod Q).tensorBimod L).actLeft ≫ hom P Q L =
(R.X ◁ hom P Q L) ≫ (P.tensorBimod (Q.tensorBimod L)).actLeft := by
dsimp; dsimp [hom, homAux]
refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_
rw [tensorLeft_map]
slice_lhs 1 2 => rw [TensorBimod.whiskerLeft_π_actLeft]
slice_lhs 3 4 => rw [coequalizer.π_desc]
slice_rhs 1 2 => rw [← MonoidalCategory.whiskerLeft_comp, coequalizer.π_desc,
MonoidalCategory.whiskerLeft_comp]
refine (cancel_epi ((tensorRight _ ⋙ tensorLeft _).map (coequalizer.π _ _))).1 ?_
dsimp; dsimp [TensorBimod.X]
slice_lhs 1 2 => rw [associator_inv_naturality_middle]
slice_lhs 2 3 =>
rw [← comp_whiskerRight, TensorBimod.whiskerLeft_π_actLeft,
comp_whiskerRight, comp_whiskerRight]
slice_lhs 4 6 => rw [π_tensor_id_preserves_coequalizer_inv_desc]
slice_lhs 3 4 => rw [associator_naturality_left]
slice_rhs 1 3 =>
rw [← MonoidalCategory.whiskerLeft_comp, ← MonoidalCategory.whiskerLeft_comp,
π_tensor_id_preserves_coequalizer_inv_desc, MonoidalCategory.whiskerLeft_comp,
MonoidalCategory.whiskerLeft_comp]
slice_rhs 3 4 => erw [TensorBimod.whiskerLeft_π_actLeft P (Q.tensorBimod L)]
slice_rhs 2 3 => erw [associator_inv_naturality_right]
slice_rhs 3 4 => erw [whisker_exchange]
monoidal
theorem hom_right_act_hom' :
((P.tensorBimod Q).tensorBimod L).actRight ≫ hom P Q L =
(hom P Q L ▷ U.X) ≫ (P.tensorBimod (Q.tensorBimod L)).actRight := by
dsimp; dsimp [hom, homAux]
refine (cancel_epi ((tensorRight _).map (coequalizer.π _ _))).1 ?_
rw [tensorRight_map]
slice_lhs 1 2 => rw [TensorBimod.π_tensor_id_actRight]
slice_lhs 3 4 => rw [coequalizer.π_desc]
slice_rhs 1 2 => rw [← comp_whiskerRight, coequalizer.π_desc, comp_whiskerRight]
refine (cancel_epi ((tensorRight _ ⋙ tensorRight _).map (coequalizer.π _ _))).1 ?_
dsimp; dsimp [TensorBimod.X]
slice_lhs 1 2 => rw [associator_naturality_left]
slice_lhs 2 3 => rw [← whisker_exchange]
slice_lhs 3 5 => rw [π_tensor_id_preserves_coequalizer_inv_desc]
slice_lhs 2 3 => rw [associator_naturality_right]
slice_rhs 1 3 =>
rw [← comp_whiskerRight, ← comp_whiskerRight, π_tensor_id_preserves_coequalizer_inv_desc,
comp_whiskerRight, comp_whiskerRight]
slice_rhs 3 4 => erw [TensorBimod.π_tensor_id_actRight P (Q.tensorBimod L)]
slice_rhs 2 3 => erw [associator_naturality_middle]
dsimp
slice_rhs 3 4 =>
rw [← MonoidalCategory.whiskerLeft_comp, TensorBimod.π_tensor_id_actRight,
MonoidalCategory.whiskerLeft_comp, MonoidalCategory.whiskerLeft_comp]
monoidal
/-- An auxiliary morphism for the definition of the underlying morphism of the inverse component of
the associator isomorphism. -/
noncomputable def invAux : P.X ⊗ (Q.tensorBimod L).X ⟶ ((P.tensorBimod Q).tensorBimod L).X :=
(PreservesCoequalizer.iso (tensorLeft P.X) _ _).inv ≫
coequalizer.desc ((α_ _ _ _).inv ≫ (coequalizer.π _ _ ▷ L.X) ≫ coequalizer.π _ _)
(by
dsimp; dsimp [TensorBimod.X]
slice_lhs 1 2 => rw [associator_inv_naturality_middle]
rw [← Iso.inv_hom_id_assoc (α_ _ _ _) (P.X ◁ Q.actRight), comp_whiskerRight]
slice_lhs 3 4 =>
rw [← comp_whiskerRight, Category.assoc, ← TensorBimod.π_tensor_id_actRight,
comp_whiskerRight]
slice_lhs 4 5 => rw [coequalizer.condition]
slice_lhs 3 4 => rw [associator_naturality_left]
slice_rhs 1 2 => rw [MonoidalCategory.whiskerLeft_comp]
slice_rhs 2 3 => rw [associator_inv_naturality_right]
slice_rhs 3 4 => rw [whisker_exchange]
monoidal)
/-- The underlying morphism of the inverse component of the associator isomorphism. -/
noncomputable def inv :
(P.tensorBimod (Q.tensorBimod L)).X ⟶ ((P.tensorBimod Q).tensorBimod L).X :=
coequalizer.desc (invAux P Q L)
(by
dsimp [invAux]
refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_
dsimp [TensorBimod.X]
slice_lhs 1 2 => rw [whisker_exchange]
slice_lhs 2 4 => rw [id_tensor_π_preserves_coequalizer_inv_desc]
slice_lhs 1 2 => rw [associator_inv_naturality_left]
slice_lhs 2 3 =>
rw [← comp_whiskerRight, coequalizer.condition, comp_whiskerRight, comp_whiskerRight]
slice_rhs 1 2 => rw [associator_naturality_right]
slice_rhs 2 3 =>
rw [← MonoidalCategory.whiskerLeft_comp, TensorBimod.whiskerLeft_π_actLeft,
MonoidalCategory.whiskerLeft_comp, MonoidalCategory.whiskerLeft_comp]
slice_rhs 4 6 => rw [id_tensor_π_preserves_coequalizer_inv_desc]
slice_rhs 3 4 => rw [associator_inv_naturality_middle]
monoidal)
theorem hom_inv_id : hom P Q L ≫ inv P Q L = 𝟙 _ := by
dsimp [hom, homAux, inv, invAux]
apply coequalizer.hom_ext
slice_lhs 1 2 => rw [coequalizer.π_desc]
refine (cancel_epi ((tensorRight _).map (coequalizer.π _ _))).1 ?_
rw [tensorRight_map]
slice_lhs 1 3 => rw [π_tensor_id_preserves_coequalizer_inv_desc]
slice_lhs 3 4 => rw [coequalizer.π_desc]
slice_lhs 2 4 => rw [id_tensor_π_preserves_coequalizer_inv_desc]
slice_lhs 1 3 => rw [Iso.hom_inv_id_assoc]
dsimp only [TensorBimod.X]
slice_rhs 2 3 => rw [Category.comp_id]
rfl
theorem inv_hom_id : inv P Q L ≫ hom P Q L = 𝟙 _ := by
dsimp [hom, homAux, inv, invAux]
apply coequalizer.hom_ext
slice_lhs 1 2 => rw [coequalizer.π_desc]
refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_
rw [tensorLeft_map]
slice_lhs 1 3 => rw [id_tensor_π_preserves_coequalizer_inv_desc]
slice_lhs 3 4 => rw [coequalizer.π_desc]
slice_lhs 2 4 => rw [π_tensor_id_preserves_coequalizer_inv_desc]
slice_lhs 1 3 => rw [Iso.inv_hom_id_assoc]
dsimp only [TensorBimod.X]
slice_rhs 2 3 => rw [Category.comp_id]
rfl
end AssociatorBimod
namespace LeftUnitorBimod
variable {R S : Mon_ C} (P : Bimod R S)
/-- The underlying morphism of the forward component of the left unitor isomorphism. -/
noncomputable def hom : TensorBimod.X (regular R) P ⟶ P.X :=
coequalizer.desc P.actLeft (by dsimp; rw [Category.assoc, left_assoc])
/-- The underlying morphism of the inverse component of the left unitor isomorphism. -/
noncomputable def inv : P.X ⟶ TensorBimod.X (regular R) P :=
(λ_ P.X).inv ≫ (R.one ▷ _) ≫ coequalizer.π _ _
theorem hom_inv_id : hom P ≫ inv P = 𝟙 _ := by
dsimp only [hom, inv, TensorBimod.X]
ext; dsimp
slice_lhs 1 2 => rw [coequalizer.π_desc]
slice_lhs 1 2 => rw [leftUnitor_inv_naturality]
slice_lhs 2 3 => rw [whisker_exchange]
slice_lhs 3 3 => rw [← Iso.inv_hom_id_assoc (α_ R.X R.X P.X) (R.X ◁ P.actLeft)]
slice_lhs 4 6 => rw [← Category.assoc, ← coequalizer.condition]
slice_lhs 2 3 => rw [associator_inv_naturality_left]
slice_lhs 3 4 => rw [← comp_whiskerRight, Mon_.one_mul]
slice_rhs 1 2 => rw [Category.comp_id]
monoidal
theorem inv_hom_id : inv P ≫ hom P = 𝟙 _ := by
dsimp [hom, inv]
| slice_lhs 3 4 => rw [coequalizer.π_desc]
rw [one_actLeft, Iso.inv_hom_id]
variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)]
variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)]
theorem hom_left_act_hom' :
((regular R).tensorBimod P).actLeft ≫ hom P = (R.X ◁ hom P) ≫ P.actLeft := by
dsimp; dsimp [hom, TensorBimod.actLeft, regular]
refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_
dsimp
slice_lhs 1 4 => rw [id_tensor_π_preserves_coequalizer_inv_colimMap_desc]
slice_lhs 2 3 => rw [left_assoc]
| Mathlib/CategoryTheory/Monoidal/Bimod.lean | 615 | 627 |
/-
Copyright (c) 2018 Robert Y. Lewis. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Robert Y. Lewis, Mario Carneiro, Johan Commelin
-/
import Mathlib.NumberTheory.Padics.PadicNumbers
import Mathlib.RingTheory.DiscreteValuationRing.Basic
/-!
# p-adic integers
This file defines the `p`-adic integers `ℤ_[p]` as the subtype of `ℚ_[p]` with norm `≤ 1`.
We show that `ℤ_[p]`
* is complete,
* is nonarchimedean,
* is a normed ring,
* is a local ring, and
* is a discrete valuation ring.
The relation between `ℤ_[p]` and `ZMod p` is established in another file.
## Important definitions
* `PadicInt` : the type of `p`-adic integers
## Notation
We introduce the notation `ℤ_[p]` for the `p`-adic integers.
## Implementation notes
Much, but not all, of this file assumes that `p` is prime. This assumption is inferred automatically
by taking `[Fact p.Prime]` as a type class argument.
Coercions into `ℤ_[p]` are set up to work with the `norm_cast` tactic.
## References
* [F. Q. Gouvêa, *p-adic numbers*][gouvea1997]
* [R. Y. Lewis, *A formal proof of Hensel's lemma over the p-adic integers*][lewis2019]
* <https://en.wikipedia.org/wiki/P-adic_number>
## Tags
p-adic, p adic, padic, p-adic integer
-/
open Padic Metric IsLocalRing
noncomputable section
variable (p : ℕ) [hp : Fact p.Prime]
/-- The `p`-adic integers `ℤ_[p]` are the `p`-adic numbers with norm `≤ 1`. -/
def PadicInt : Type := {x : ℚ_[p] // ‖x‖ ≤ 1}
/-- The ring of `p`-adic integers. -/
notation "ℤ_[" p "]" => PadicInt p
namespace PadicInt
variable {p} {x y : ℤ_[p]}
/-! ### Ring structure and coercion to `ℚ_[p]` -/
instance : Coe ℤ_[p] ℚ_[p] :=
⟨Subtype.val⟩
theorem ext {x y : ℤ_[p]} : (x : ℚ_[p]) = y → x = y :=
Subtype.ext
variable (p)
/-- The `p`-adic integers as a subring of `ℚ_[p]`. -/
def subring : Subring ℚ_[p] where
carrier := { x : ℚ_[p] | ‖x‖ ≤ 1 }
zero_mem' := by norm_num
one_mem' := by norm_num
add_mem' hx hy := (padicNormE.nonarchimedean _ _).trans <| max_le_iff.2 ⟨hx, hy⟩
mul_mem' hx hy := (padicNormE.mul _ _).trans_le <| mul_le_one₀ hx (norm_nonneg _) hy
neg_mem' hx := (norm_neg _).trans_le hx
@[simp]
theorem mem_subring_iff {x : ℚ_[p]} : x ∈ subring p ↔ ‖x‖ ≤ 1 := Iff.rfl
variable {p}
instance instCommRing : CommRing ℤ_[p] := inferInstanceAs <| CommRing (subring p)
instance : Inhabited ℤ_[p] := ⟨0⟩
@[simp]
theorem mk_zero {h} : (⟨0, h⟩ : ℤ_[p]) = (0 : ℤ_[p]) := rfl
@[simp, norm_cast]
theorem coe_add (z1 z2 : ℤ_[p]) : ((z1 + z2 : ℤ_[p]) : ℚ_[p]) = z1 + z2 := rfl
@[simp, norm_cast]
theorem coe_mul (z1 z2 : ℤ_[p]) : ((z1 * z2 : ℤ_[p]) : ℚ_[p]) = z1 * z2 := rfl
@[simp, norm_cast]
theorem coe_neg (z1 : ℤ_[p]) : ((-z1 : ℤ_[p]) : ℚ_[p]) = -z1 := rfl
@[simp, norm_cast]
theorem coe_sub (z1 z2 : ℤ_[p]) : ((z1 - z2 : ℤ_[p]) : ℚ_[p]) = z1 - z2 := rfl
@[simp, norm_cast]
theorem coe_one : ((1 : ℤ_[p]) : ℚ_[p]) = 1 := rfl
@[simp, norm_cast]
theorem coe_zero : ((0 : ℤ_[p]) : ℚ_[p]) = 0 := rfl
@[simp] lemma coe_eq_zero : (x : ℚ_[p]) = 0 ↔ x = 0 := by rw [← coe_zero, Subtype.coe_inj]
lemma coe_ne_zero : (x : ℚ_[p]) ≠ 0 ↔ x ≠ 0 := coe_eq_zero.not
@[simp, norm_cast]
theorem coe_natCast (n : ℕ) : ((n : ℤ_[p]) : ℚ_[p]) = n := rfl
@[simp, norm_cast]
theorem coe_intCast (z : ℤ) : ((z : ℤ_[p]) : ℚ_[p]) = z := rfl
/-- The coercion from `ℤ_[p]` to `ℚ_[p]` as a ring homomorphism. -/
def Coe.ringHom : ℤ_[p] →+* ℚ_[p] := (subring p).subtype
@[simp, norm_cast]
theorem coe_pow (x : ℤ_[p]) (n : ℕ) : (↑(x ^ n) : ℚ_[p]) = (↑x : ℚ_[p]) ^ n := rfl
theorem mk_coe (k : ℤ_[p]) : (⟨k, k.2⟩ : ℤ_[p]) = k := by simp
/-- The inverse of a `p`-adic integer with norm equal to `1` is also a `p`-adic integer.
Otherwise, the inverse is defined to be `0`. -/
def inv : ℤ_[p] → ℤ_[p]
| ⟨k, _⟩ => if h : ‖k‖ = 1 then ⟨k⁻¹, by simp [h]⟩ else 0
instance : CharZero ℤ_[p] where
cast_injective m n h :=
Nat.cast_injective (R := ℚ_[p]) (by rw [Subtype.ext_iff] at h; norm_cast at h)
@[norm_cast]
theorem intCast_eq (z1 z2 : ℤ) : (z1 : ℤ_[p]) = z2 ↔ z1 = z2 := by simp
/-- A sequence of integers that is Cauchy with respect to the `p`-adic norm converges to a `p`-adic
integer. -/
def ofIntSeq (seq : ℕ → ℤ) (h : IsCauSeq (padicNorm p) fun n => seq n) : ℤ_[p] :=
⟨⟦⟨_, h⟩⟧,
show ↑(PadicSeq.norm _) ≤ (1 : ℝ) by
rw [PadicSeq.norm]
split_ifs with hne <;> norm_cast
apply padicNorm.of_int⟩
/-! ### Instances
We now show that `ℤ_[p]` is a
* complete metric space
* normed ring
* integral domain
-/
variable (p)
instance : MetricSpace ℤ_[p] := Subtype.metricSpace
instance : IsUltrametricDist ℤ_[p] := IsUltrametricDist.subtype _
instance completeSpace : CompleteSpace ℤ_[p] :=
have : IsClosed { x : ℚ_[p] | ‖x‖ ≤ 1 } := isClosed_le continuous_norm continuous_const
this.completeSpace_coe
instance : Norm ℤ_[p] := ⟨fun z => ‖(z : ℚ_[p])‖⟩
variable {p} in
theorem norm_def {z : ℤ_[p]} : ‖z‖ = ‖(z : ℚ_[p])‖ := rfl
instance : NormedCommRing ℤ_[p] where
__ := instCommRing
dist_eq := fun ⟨_, _⟩ ⟨_, _⟩ ↦ rfl
norm_mul_le := by simp [norm_def]
instance : NormOneClass ℤ_[p] :=
⟨norm_def.trans norm_one⟩
instance : NormMulClass ℤ_[p] := ⟨fun x y ↦ by simp [norm_def]⟩
instance : IsDomain ℤ_[p] := NoZeroDivisors.to_isDomain _
variable {p}
/-! ### Norm -/
theorem norm_le_one (z : ℤ_[p]) : ‖z‖ ≤ 1 := z.2
theorem nonarchimedean (q r : ℤ_[p]) : ‖q + r‖ ≤ max ‖q‖ ‖r‖ := padicNormE.nonarchimedean _ _
theorem norm_add_eq_max_of_ne {q r : ℤ_[p]} : ‖q‖ ≠ ‖r‖ → ‖q + r‖ = max ‖q‖ ‖r‖ :=
padicNormE.add_eq_max_of_ne
theorem norm_eq_of_norm_add_lt_right {z1 z2 : ℤ_[p]} (h : ‖z1 + z2‖ < ‖z2‖) : ‖z1‖ = ‖z2‖ :=
by_contra fun hne =>
not_lt_of_ge (by rw [norm_add_eq_max_of_ne hne]; apply le_max_right) h
theorem norm_eq_of_norm_add_lt_left {z1 z2 : ℤ_[p]} (h : ‖z1 + z2‖ < ‖z1‖) : ‖z1‖ = ‖z2‖ :=
by_contra fun hne =>
not_lt_of_ge (by rw [norm_add_eq_max_of_ne hne]; apply le_max_left) h
@[simp]
theorem padic_norm_e_of_padicInt (z : ℤ_[p]) : ‖(z : ℚ_[p])‖ = ‖z‖ := by simp [norm_def]
theorem norm_intCast_eq_padic_norm (z : ℤ) : ‖(z : ℤ_[p])‖ = ‖(z : ℚ_[p])‖ := by simp [norm_def]
@[simp]
theorem norm_eq_padic_norm {q : ℚ_[p]} (hq : ‖q‖ ≤ 1) : @norm ℤ_[p] _ ⟨q, hq⟩ = ‖q‖ := rfl
@[simp]
theorem norm_p : ‖(p : ℤ_[p])‖ = (p : ℝ)⁻¹ := padicNormE.norm_p
theorem norm_p_pow (n : ℕ) : ‖(p : ℤ_[p]) ^ n‖ = (p : ℝ) ^ (-n : ℤ) := by simp
private def cauSeq_to_rat_cauSeq (f : CauSeq ℤ_[p] norm) : CauSeq ℚ_[p] fun a => ‖a‖ :=
⟨fun n => f n, fun _ hε => by simpa [norm, norm_def] using f.cauchy hε⟩
variable (p)
instance complete : CauSeq.IsComplete ℤ_[p] norm :=
⟨fun f =>
have hqn : ‖CauSeq.lim (cauSeq_to_rat_cauSeq f)‖ ≤ 1 :=
padicNormE_lim_le zero_lt_one fun _ => norm_le_one _
⟨⟨_, hqn⟩, fun ε => by
simpa [norm, norm_def] using CauSeq.equiv_lim (cauSeq_to_rat_cauSeq f) ε⟩⟩
theorem exists_pow_neg_lt {ε : ℝ} (hε : 0 < ε) : ∃ k : ℕ, (p : ℝ) ^ (-(k : ℤ)) < ε := by
obtain ⟨k, hk⟩ := exists_nat_gt ε⁻¹
use k
rw [← inv_lt_inv₀ hε (zpow_pos _ _)]
· rw [zpow_neg, inv_inv, zpow_natCast]
apply lt_of_lt_of_le hk
norm_cast
apply le_of_lt
convert Nat.lt_pow_self _ using 1
exact hp.1.one_lt
· exact mod_cast hp.1.pos
theorem exists_pow_neg_lt_rat {ε : ℚ} (hε : 0 < ε) : ∃ k : ℕ, (p : ℚ) ^ (-(k : ℤ)) < ε := by
obtain ⟨k, hk⟩ := @exists_pow_neg_lt p _ ε (mod_cast hε)
use k
rw [show (p : ℝ) = (p : ℚ) by simp] at hk
exact mod_cast hk
variable {p}
theorem norm_int_lt_one_iff_dvd (k : ℤ) : ‖(k : ℤ_[p])‖ < 1 ↔ (p : ℤ) ∣ k :=
suffices ‖(k : ℚ_[p])‖ < 1 ↔ ↑p ∣ k by rwa [norm_intCast_eq_padic_norm]
padicNormE.norm_int_lt_one_iff_dvd k
theorem norm_int_le_pow_iff_dvd {k : ℤ} {n : ℕ} :
‖(k : ℤ_[p])‖ ≤ (p : ℝ) ^ (-n : ℤ) ↔ (p ^ n : ℤ) ∣ k :=
suffices ‖(k : ℚ_[p])‖ ≤ (p : ℝ) ^ (-n : ℤ) ↔ (p ^ n : ℤ) ∣ k by
simpa [norm_intCast_eq_padic_norm]
padicNormE.norm_int_le_pow_iff_dvd _ _
/-! ### Valuation on `ℤ_[p]` -/
lemma valuation_coe_nonneg : 0 ≤ (x : ℚ_[p]).valuation := by
obtain rfl | hx := eq_or_ne x 0
· simp
have := x.2
rwa [Padic.norm_eq_zpow_neg_valuation <| coe_ne_zero.2 hx, zpow_le_one_iff_right₀, neg_nonpos]
at this
exact mod_cast hp.out.one_lt
/-- `PadicInt.valuation` lifts the `p`-adic valuation on `ℚ` to `ℤ_[p]`. -/
def valuation (x : ℤ_[p]) : ℕ := (x : ℚ_[p]).valuation.toNat
@[simp, norm_cast] lemma valuation_coe (x : ℤ_[p]) : (x : ℚ_[p]).valuation = x.valuation := by
simp [valuation, valuation_coe_nonneg]
@[simp] lemma valuation_zero : valuation (0 : ℤ_[p]) = 0 := by simp [valuation]
@[simp] lemma valuation_one : valuation (1 : ℤ_[p]) = 0 := by simp [valuation]
@[simp] lemma valuation_p : valuation (p : ℤ_[p]) = 1 := by simp [valuation]
lemma le_valuation_add (hxy : x + y ≠ 0) : min x.valuation y.valuation ≤ (x + y).valuation := by
zify; simpa [← valuation_coe] using Padic.le_valuation_add <| coe_ne_zero.2 hxy
@[simp] lemma valuation_mul (hx : x ≠ 0) (hy : y ≠ 0) :
(x * y).valuation = x.valuation + y.valuation := by
zify; simp [← valuation_coe, Padic.valuation_mul (coe_ne_zero.2 hx) (coe_ne_zero.2 hy)]
@[simp]
lemma valuation_pow (x : ℤ_[p]) (n : ℕ) : (x ^ n).valuation = n * x.valuation := by
zify; simp [← valuation_coe]
lemma norm_eq_zpow_neg_valuation {x : ℤ_[p]} (hx : x ≠ 0) : ‖x‖ = p ^ (-x.valuation : ℤ) := by
simp [norm_def, Padic.norm_eq_zpow_neg_valuation <| coe_ne_zero.2 hx]
@[deprecated (since := "2024-12-10")] alias norm_eq_pow_val := norm_eq_zpow_neg_valuation
-- TODO: Do we really need this lemma?
@[simp]
theorem valuation_p_pow_mul (n : ℕ) (c : ℤ_[p]) (hc : c ≠ 0) :
((p : ℤ_[p]) ^ n * c).valuation = n + c.valuation := by
rw [valuation_mul (NeZero.ne _) hc, valuation_pow, valuation_p, mul_one]
section Units
| /-! ### Units of `ℤ_[p]` -/
| Mathlib/NumberTheory/Padics/PadicIntegers.lean | 305 | 305 |
/-
Copyright (c) 2023 Joël Riou. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Joël Riou
-/
import Mathlib.Algebra.Homology.ShortComplex.LeftHomology
import Mathlib.CategoryTheory.Limits.Opposites
/-!
# Right Homology of short complexes
In this file, we define the dual notions to those defined in
`Algebra.Homology.ShortComplex.LeftHomology`. In particular, if `S : ShortComplex C` is
a short complex consisting of two composable maps `f : X₁ ⟶ X₂` and `g : X₂ ⟶ X₃` such
that `f ≫ g = 0`, we define `h : S.RightHomologyData` to be the datum of morphisms
`p : X₂ ⟶ Q` and `ι : H ⟶ Q` such that `Q` identifies to the cokernel of `f` and `H`
to the kernel of the induced map `g' : Q ⟶ X₃`.
When such a `S.RightHomologyData` exists, we shall say that `[S.HasRightHomology]`
and we define `S.rightHomology` to be the `H` field of a chosen right homology data.
Similarly, we define `S.opcycles` to be the `Q` field.
In `Homology.lean`, when `S` has two compatible left and right homology data
(i.e. they give the same `H` up to a canonical isomorphism), we shall define
`[S.HasHomology]` and `S.homology`.
-/
namespace CategoryTheory
open Category Limits
namespace ShortComplex
variable {C : Type*} [Category C] [HasZeroMorphisms C]
(S : ShortComplex C) {S₁ S₂ S₃ : ShortComplex C}
/-- A right homology data for a short complex `S` consists of morphisms `p : S.X₂ ⟶ Q` and
`ι : H ⟶ Q` such that `p` identifies `Q` to the kernel of `f : S.X₁ ⟶ S.X₂`,
and that `ι` identifies `H` to the kernel of the induced map `g' : Q ⟶ S.X₃` -/
structure RightHomologyData where
/-- a choice of cokernel of `S.f : S.X₁ ⟶ S.X₂` -/
Q : C
/-- a choice of kernel of the induced morphism `S.g' : S.Q ⟶ X₃` -/
H : C
/-- the projection from `S.X₂` -/
p : S.X₂ ⟶ Q
/-- the inclusion of the (right) homology in the chosen cokernel of `S.f` -/
ι : H ⟶ Q
/-- the cokernel condition for `p` -/
wp : S.f ≫ p = 0
/-- `p : S.X₂ ⟶ Q` is a cokernel of `S.f : S.X₁ ⟶ S.X₂` -/
hp : IsColimit (CokernelCofork.ofπ p wp)
/-- the kernel condition for `ι` -/
wι : ι ≫ hp.desc (CokernelCofork.ofπ _ S.zero) = 0
/-- `ι : H ⟶ Q` is a kernel of `S.g' : Q ⟶ S.X₃` -/
hι : IsLimit (KernelFork.ofι ι wι)
initialize_simps_projections RightHomologyData (-hp, -hι)
namespace RightHomologyData
/-- The chosen cokernels and kernels of the limits API give a `RightHomologyData` -/
@[simps]
noncomputable def ofHasCokernelOfHasKernel
[HasCokernel S.f] [HasKernel (cokernel.desc S.f S.g S.zero)] :
S.RightHomologyData :=
{ Q := cokernel S.f,
H := kernel (cokernel.desc S.f S.g S.zero),
p := cokernel.π _,
ι := kernel.ι _,
wp := cokernel.condition _,
hp := cokernelIsCokernel _,
wι := kernel.condition _,
hι := kernelIsKernel _, }
attribute [reassoc (attr := simp)] wp wι
variable {S}
variable (h : S.RightHomologyData) {A : C}
instance : Epi h.p := ⟨fun _ _ => Cofork.IsColimit.hom_ext h.hp⟩
instance : Mono h.ι := ⟨fun _ _ => Fork.IsLimit.hom_ext h.hι⟩
/-- Any morphism `k : S.X₂ ⟶ A` such that `S.f ≫ k = 0` descends
to a morphism `Q ⟶ A` -/
def descQ (k : S.X₂ ⟶ A) (hk : S.f ≫ k = 0) : h.Q ⟶ A :=
h.hp.desc (CokernelCofork.ofπ k hk)
@[reassoc (attr := simp)]
lemma p_descQ (k : S.X₂ ⟶ A) (hk : S.f ≫ k = 0) : h.p ≫ h.descQ k hk = k :=
h.hp.fac _ WalkingParallelPair.one
/-- The morphism from the (right) homology attached to a morphism
`k : S.X₂ ⟶ A` such that `S.f ≫ k = 0`. -/
@[simp]
def descH (k : S.X₂ ⟶ A) (hk : S.f ≫ k = 0) : h.H ⟶ A :=
h.ι ≫ h.descQ k hk
/-- The morphism `h.Q ⟶ S.X₃` induced by `S.g : S.X₂ ⟶ S.X₃` and the fact that
`h.Q` is a cokernel of `S.f : S.X₁ ⟶ S.X₂`. -/
def g' : h.Q ⟶ S.X₃ := h.descQ S.g S.zero
@[reassoc (attr := simp)] lemma p_g' : h.p ≫ h.g' = S.g := p_descQ _ _ _
@[reassoc (attr := simp)] lemma ι_g' : h.ι ≫ h.g' = 0 := h.wι
@[reassoc]
lemma ι_descQ_eq_zero_of_boundary (k : S.X₂ ⟶ A) (x : S.X₃ ⟶ A) (hx : k = S.g ≫ x) :
h.ι ≫ h.descQ k (by rw [hx, S.zero_assoc, zero_comp]) = 0 := by
rw [show 0 = h.ι ≫ h.g' ≫ x by simp]
congr 1
simp only [← cancel_epi h.p, hx, p_descQ, p_g'_assoc]
/-- For `h : S.RightHomologyData`, this is a restatement of `h.hι`, saying that
`ι : h.H ⟶ h.Q` is a kernel of `h.g' : h.Q ⟶ S.X₃`. -/
def hι' : IsLimit (KernelFork.ofι h.ι h.ι_g') := h.hι
/-- The morphism `A ⟶ H` induced by a morphism `k : A ⟶ Q` such that `k ≫ g' = 0` -/
def liftH (k : A ⟶ h.Q) (hk : k ≫ h.g' = 0) : A ⟶ h.H :=
h.hι.lift (KernelFork.ofι k hk)
@[reassoc (attr := simp)]
lemma liftH_ι (k : A ⟶ h.Q) (hk : k ≫ h.g' = 0) : h.liftH k hk ≫ h.ι = k :=
h.hι.fac (KernelFork.ofι k hk) WalkingParallelPair.zero
lemma isIso_p (hf : S.f = 0) : IsIso h.p :=
⟨h.descQ (𝟙 S.X₂) (by rw [hf, comp_id]), p_descQ _ _ _, by
simp only [← cancel_epi h.p, p_descQ_assoc, id_comp, comp_id]⟩
lemma isIso_ι (hg : S.g = 0) : IsIso h.ι := by
have ⟨φ, hφ⟩ := KernelFork.IsLimit.lift' h.hι' (𝟙 _)
(by rw [← cancel_epi h.p, id_comp, p_g', comp_zero, hg])
dsimp at hφ
exact ⟨φ, by rw [← cancel_mono h.ι, assoc, hφ, comp_id, id_comp], hφ⟩
variable (S)
/-- When the first map `S.f` is zero, this is the right homology data on `S` given
by any limit kernel fork of `S.g` -/
@[simps]
def ofIsLimitKernelFork (hf : S.f = 0) (c : KernelFork S.g) (hc : IsLimit c) :
S.RightHomologyData where
Q := S.X₂
H := c.pt
p := 𝟙 _
ι := c.ι
wp := by rw [comp_id, hf]
hp := CokernelCofork.IsColimit.ofId _ hf
wι := KernelFork.condition _
hι := IsLimit.ofIsoLimit hc (Fork.ext (Iso.refl _) (by simp))
@[simp] lemma ofIsLimitKernelFork_g' (hf : S.f = 0) (c : KernelFork S.g)
(hc : IsLimit c) : (ofIsLimitKernelFork S hf c hc).g' = S.g := by
rw [← cancel_epi (ofIsLimitKernelFork S hf c hc).p, p_g',
ofIsLimitKernelFork_p, id_comp]
/-- When the first map `S.f` is zero, this is the right homology data on `S` given by
the chosen `kernel S.g` -/
@[simps!]
noncomputable def ofHasKernel [HasKernel S.g] (hf : S.f = 0) : S.RightHomologyData :=
ofIsLimitKernelFork S hf _ (kernelIsKernel _)
/-- When the second map `S.g` is zero, this is the right homology data on `S` given
by any colimit cokernel cofork of `S.g` -/
@[simps]
def ofIsColimitCokernelCofork (hg : S.g = 0) (c : CokernelCofork S.f) (hc : IsColimit c) :
S.RightHomologyData where
Q := c.pt
H := c.pt
p := c.π
ι := 𝟙 _
wp := CokernelCofork.condition _
hp := IsColimit.ofIsoColimit hc (Cofork.ext (Iso.refl _) (by simp))
wι := Cofork.IsColimit.hom_ext hc (by simp [hg])
hι := KernelFork.IsLimit.ofId _ (Cofork.IsColimit.hom_ext hc (by simp [hg]))
@[simp] lemma ofIsColimitCokernelCofork_g' (hg : S.g = 0) (c : CokernelCofork S.f)
(hc : IsColimit c) : (ofIsColimitCokernelCofork S hg c hc).g' = 0 := by
rw [← cancel_epi (ofIsColimitCokernelCofork S hg c hc).p, p_g', hg, comp_zero]
/-- When the second map `S.g` is zero, this is the right homology data on `S` given
by the chosen `cokernel S.f` -/
@[simp]
noncomputable def ofHasCokernel [HasCokernel S.f] (hg : S.g = 0) : S.RightHomologyData :=
ofIsColimitCokernelCofork S hg _ (cokernelIsCokernel _)
/-- When both `S.f` and `S.g` are zero, the middle object `S.X₂`
gives a right homology data on S -/
@[simps]
def ofZeros (hf : S.f = 0) (hg : S.g = 0) : S.RightHomologyData where
Q := S.X₂
H := S.X₂
p := 𝟙 _
ι := 𝟙 _
wp := by rw [comp_id, hf]
hp := CokernelCofork.IsColimit.ofId _ hf
wι := by
change 𝟙 _ ≫ S.g = 0
simp only [hg, comp_zero]
hι := KernelFork.IsLimit.ofId _ hg
@[simp]
lemma ofZeros_g' (hf : S.f = 0) (hg : S.g = 0) :
(ofZeros S hf hg).g' = 0 := by
rw [← cancel_epi ((ofZeros S hf hg).p), comp_zero, p_g', hg]
end RightHomologyData
/-- A short complex `S` has right homology when there exists a `S.RightHomologyData` -/
class HasRightHomology : Prop where
condition : Nonempty S.RightHomologyData
/-- A chosen `S.RightHomologyData` for a short complex `S` that has right homology -/
noncomputable def rightHomologyData [HasRightHomology S] :
S.RightHomologyData := HasRightHomology.condition.some
variable {S}
namespace HasRightHomology
lemma mk' (h : S.RightHomologyData) : HasRightHomology S := ⟨Nonempty.intro h⟩
instance of_hasCokernel_of_hasKernel
[HasCokernel S.f] [HasKernel (cokernel.desc S.f S.g S.zero)] :
S.HasRightHomology := HasRightHomology.mk' (RightHomologyData.ofHasCokernelOfHasKernel S)
instance of_hasKernel {Y Z : C} (g : Y ⟶ Z) (X : C) [HasKernel g] :
(ShortComplex.mk (0 : X ⟶ Y) g zero_comp).HasRightHomology :=
HasRightHomology.mk' (RightHomologyData.ofHasKernel _ rfl)
instance of_hasCokernel {X Y : C} (f : X ⟶ Y) (Z : C) [HasCokernel f] :
(ShortComplex.mk f (0 : Y ⟶ Z) comp_zero).HasRightHomology :=
HasRightHomology.mk' (RightHomologyData.ofHasCokernel _ rfl)
instance of_zeros (X Y Z : C) :
(ShortComplex.mk (0 : X ⟶ Y) (0 : Y ⟶ Z) zero_comp).HasRightHomology :=
HasRightHomology.mk' (RightHomologyData.ofZeros _ rfl rfl)
end HasRightHomology
namespace RightHomologyData
/-- A right homology data for a short complex `S` induces a left homology data for `S.op`. -/
@[simps]
def op (h : S.RightHomologyData) : S.op.LeftHomologyData where
K := Opposite.op h.Q
H := Opposite.op h.H
i := h.p.op
π := h.ι.op
wi := Quiver.Hom.unop_inj h.wp
hi := CokernelCofork.IsColimit.ofπOp _ _ h.hp
wπ := Quiver.Hom.unop_inj h.wι
hπ := KernelFork.IsLimit.ofιOp _ _ h.hι
@[simp] lemma op_f' (h : S.RightHomologyData) :
h.op.f' = h.g'.op := rfl
/-- A right homology data for a short complex `S` in the opposite category
induces a left homology data for `S.unop`. -/
@[simps]
def unop {S : ShortComplex Cᵒᵖ} (h : S.RightHomologyData) : S.unop.LeftHomologyData where
K := Opposite.unop h.Q
H := Opposite.unop h.H
i := h.p.unop
π := h.ι.unop
wi := Quiver.Hom.op_inj h.wp
hi := CokernelCofork.IsColimit.ofπUnop _ _ h.hp
wπ := Quiver.Hom.op_inj h.wι
hπ := KernelFork.IsLimit.ofιUnop _ _ h.hι
@[simp] lemma unop_f' {S : ShortComplex Cᵒᵖ} (h : S.RightHomologyData) :
h.unop.f' = h.g'.unop := rfl
end RightHomologyData
namespace LeftHomologyData
/-- A left homology data for a short complex `S` induces a right homology data for `S.op`. -/
@[simps]
def op (h : S.LeftHomologyData) : S.op.RightHomologyData where
Q := Opposite.op h.K
H := Opposite.op h.H
p := h.i.op
ι := h.π.op
wp := Quiver.Hom.unop_inj h.wi
hp := KernelFork.IsLimit.ofιOp _ _ h.hi
wι := Quiver.Hom.unop_inj h.wπ
hι := CokernelCofork.IsColimit.ofπOp _ _ h.hπ
@[simp] lemma op_g' (h : S.LeftHomologyData) :
h.op.g' = h.f'.op := rfl
/-- A left homology data for a short complex `S` in the opposite category
induces a right homology data for `S.unop`. -/
@[simps]
def unop {S : ShortComplex Cᵒᵖ} (h : S.LeftHomologyData) : S.unop.RightHomologyData where
Q := Opposite.unop h.K
H := Opposite.unop h.H
p := h.i.unop
ι := h.π.unop
wp := Quiver.Hom.op_inj h.wi
hp := KernelFork.IsLimit.ofιUnop _ _ h.hi
wι := Quiver.Hom.op_inj h.wπ
hι := CokernelCofork.IsColimit.ofπUnop _ _ h.hπ
@[simp] lemma unop_g' {S : ShortComplex Cᵒᵖ} (h : S.LeftHomologyData) :
h.unop.g' = h.f'.unop := rfl
end LeftHomologyData
instance [S.HasLeftHomology] : HasRightHomology S.op :=
HasRightHomology.mk' S.leftHomologyData.op
instance [S.HasRightHomology] : HasLeftHomology S.op :=
HasLeftHomology.mk' S.rightHomologyData.op
lemma hasLeftHomology_iff_op (S : ShortComplex C) :
S.HasLeftHomology ↔ S.op.HasRightHomology :=
⟨fun _ => inferInstance, fun _ => HasLeftHomology.mk' S.op.rightHomologyData.unop⟩
lemma hasRightHomology_iff_op (S : ShortComplex C) :
S.HasRightHomology ↔ S.op.HasLeftHomology :=
⟨fun _ => inferInstance, fun _ => HasRightHomology.mk' S.op.leftHomologyData.unop⟩
lemma hasLeftHomology_iff_unop (S : ShortComplex Cᵒᵖ) :
S.HasLeftHomology ↔ S.unop.HasRightHomology :=
S.unop.hasRightHomology_iff_op.symm
lemma hasRightHomology_iff_unop (S : ShortComplex Cᵒᵖ) :
S.HasRightHomology ↔ S.unop.HasLeftHomology :=
S.unop.hasLeftHomology_iff_op.symm
section
variable (φ : S₁ ⟶ S₂) (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData)
/-- Given right homology data `h₁` and `h₂` for two short complexes `S₁` and `S₂`,
a `RightHomologyMapData` for a morphism `φ : S₁ ⟶ S₂`
consists of a description of the induced morphisms on the `Q` (opcycles)
and `H` (right homology) fields of `h₁` and `h₂`. -/
structure RightHomologyMapData where
/-- the induced map on opcycles -/
φQ : h₁.Q ⟶ h₂.Q
/-- the induced map on right homology -/
φH : h₁.H ⟶ h₂.H
/-- commutation with `p` -/
commp : h₁.p ≫ φQ = φ.τ₂ ≫ h₂.p := by aesop_cat
/-- commutation with `g'` -/
commg' : φQ ≫ h₂.g' = h₁.g' ≫ φ.τ₃ := by aesop_cat
/-- commutation with `ι` -/
commι : φH ≫ h₂.ι = h₁.ι ≫ φQ := by aesop_cat
namespace RightHomologyMapData
attribute [reassoc (attr := simp)] commp commg' commι
/-- The right homology map data associated to the zero morphism between two short complexes. -/
@[simps]
def zero (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) :
RightHomologyMapData 0 h₁ h₂ where
φQ := 0
φH := 0
/-- The right homology map data associated to the identity morphism of a short complex. -/
@[simps]
def id (h : S.RightHomologyData) : RightHomologyMapData (𝟙 S) h h where
φQ := 𝟙 _
φH := 𝟙 _
/-- The composition of right homology map data. -/
@[simps]
def comp {φ : S₁ ⟶ S₂} {φ' : S₂ ⟶ S₃} {h₁ : S₁.RightHomologyData}
{h₂ : S₂.RightHomologyData} {h₃ : S₃.RightHomologyData}
(ψ : RightHomologyMapData φ h₁ h₂) (ψ' : RightHomologyMapData φ' h₂ h₃) :
RightHomologyMapData (φ ≫ φ') h₁ h₃ where
φQ := ψ.φQ ≫ ψ'.φQ
φH := ψ.φH ≫ ψ'.φH
instance : Subsingleton (RightHomologyMapData φ h₁ h₂) :=
⟨fun ψ₁ ψ₂ => by
have hQ : ψ₁.φQ = ψ₂.φQ := by rw [← cancel_epi h₁.p, commp, commp]
have hH : ψ₁.φH = ψ₂.φH := by rw [← cancel_mono h₂.ι, commι, commι, hQ]
cases ψ₁
cases ψ₂
congr⟩
instance : Inhabited (RightHomologyMapData φ h₁ h₂) := ⟨by
let φQ : h₁.Q ⟶ h₂.Q := h₁.descQ (φ.τ₂ ≫ h₂.p) (by rw [← φ.comm₁₂_assoc, h₂.wp, comp_zero])
have commg' : φQ ≫ h₂.g' = h₁.g' ≫ φ.τ₃ := by
rw [← cancel_epi h₁.p, RightHomologyData.p_descQ_assoc, assoc,
RightHomologyData.p_g', φ.comm₂₃, RightHomologyData.p_g'_assoc]
let φH : h₁.H ⟶ h₂.H := h₂.liftH (h₁.ι ≫ φQ)
(by rw [assoc, commg', RightHomologyData.ι_g'_assoc, zero_comp])
exact ⟨φQ, φH, by simp [φQ], commg', by simp [φH]⟩⟩
instance : Unique (RightHomologyMapData φ h₁ h₂) := Unique.mk' _
variable {φ h₁ h₂}
lemma congr_φH {γ₁ γ₂ : RightHomologyMapData φ h₁ h₂} (eq : γ₁ = γ₂) : γ₁.φH = γ₂.φH := by rw [eq]
lemma congr_φQ {γ₁ γ₂ : RightHomologyMapData φ h₁ h₂} (eq : γ₁ = γ₂) : γ₁.φQ = γ₂.φQ := by rw [eq]
/-- When `S₁.f`, `S₁.g`, `S₂.f` and `S₂.g` are all zero, the action on right homology of a
morphism `φ : S₁ ⟶ S₂` is given by the action `φ.τ₂` on the middle objects. -/
@[simps]
def ofZeros (φ : S₁ ⟶ S₂) (hf₁ : S₁.f = 0) (hg₁ : S₁.g = 0) (hf₂ : S₂.f = 0) (hg₂ : S₂.g = 0) :
RightHomologyMapData φ (RightHomologyData.ofZeros S₁ hf₁ hg₁)
(RightHomologyData.ofZeros S₂ hf₂ hg₂) where
φQ := φ.τ₂
φH := φ.τ₂
/-- When `S₁.f` and `S₂.f` are zero and we have chosen limit kernel forks `c₁` and `c₂`
for `S₁.g` and `S₂.g` respectively, the action on right homology of a morphism `φ : S₁ ⟶ S₂` of
short complexes is given by the unique morphism `f : c₁.pt ⟶ c₂.pt` such that
`c₁.ι ≫ φ.τ₂ = f ≫ c₂.ι`. -/
@[simps]
def ofIsLimitKernelFork (φ : S₁ ⟶ S₂)
(hf₁ : S₁.f = 0) (c₁ : KernelFork S₁.g) (hc₁ : IsLimit c₁)
(hf₂ : S₂.f = 0) (c₂ : KernelFork S₂.g) (hc₂ : IsLimit c₂) (f : c₁.pt ⟶ c₂.pt)
(comm : c₁.ι ≫ φ.τ₂ = f ≫ c₂.ι) :
RightHomologyMapData φ (RightHomologyData.ofIsLimitKernelFork S₁ hf₁ c₁ hc₁)
(RightHomologyData.ofIsLimitKernelFork S₂ hf₂ c₂ hc₂) where
φQ := φ.τ₂
φH := f
commg' := by simp only [RightHomologyData.ofIsLimitKernelFork_g', φ.comm₂₃]
commι := comm.symm
/-- When `S₁.g` and `S₂.g` are zero and we have chosen colimit cokernel coforks `c₁` and `c₂`
for `S₁.f` and `S₂.f` respectively, the action on right homology of a morphism `φ : S₁ ⟶ S₂` of
short complexes is given by the unique morphism `f : c₁.pt ⟶ c₂.pt` such that
`φ.τ₂ ≫ c₂.π = c₁.π ≫ f`. -/
@[simps]
def ofIsColimitCokernelCofork (φ : S₁ ⟶ S₂)
(hg₁ : S₁.g = 0) (c₁ : CokernelCofork S₁.f) (hc₁ : IsColimit c₁)
(hg₂ : S₂.g = 0) (c₂ : CokernelCofork S₂.f) (hc₂ : IsColimit c₂) (f : c₁.pt ⟶ c₂.pt)
(comm : φ.τ₂ ≫ c₂.π = c₁.π ≫ f) :
RightHomologyMapData φ (RightHomologyData.ofIsColimitCokernelCofork S₁ hg₁ c₁ hc₁)
(RightHomologyData.ofIsColimitCokernelCofork S₂ hg₂ c₂ hc₂) where
φQ := f
φH := f
commp := comm.symm
variable (S)
/-- When both maps `S.f` and `S.g` of a short complex `S` are zero, this is the right homology map
data (for the identity of `S`) which relates the right homology data
`RightHomologyData.ofIsLimitKernelFork` and `ofZeros` . -/
@[simps]
def compatibilityOfZerosOfIsLimitKernelFork (hf : S.f = 0) (hg : S.g = 0)
(c : KernelFork S.g) (hc : IsLimit c) :
RightHomologyMapData (𝟙 S)
(RightHomologyData.ofIsLimitKernelFork S hf c hc)
(RightHomologyData.ofZeros S hf hg) where
φQ := 𝟙 _
φH := c.ι
/-- When both maps `S.f` and `S.g` of a short complex `S` are zero, this is the right homology map
data (for the identity of `S`) which relates the right homology data `ofZeros` and
`ofIsColimitCokernelCofork`. -/
@[simps]
def compatibilityOfZerosOfIsColimitCokernelCofork (hf : S.f = 0) (hg : S.g = 0)
(c : CokernelCofork S.f) (hc : IsColimit c) :
RightHomologyMapData (𝟙 S)
(RightHomologyData.ofZeros S hf hg)
(RightHomologyData.ofIsColimitCokernelCofork S hg c hc) where
φQ := c.π
φH := c.π
end RightHomologyMapData
end
section
variable (S)
variable [S.HasRightHomology]
/-- The right homology of a short complex,
given by the `H` field of a chosen right homology data. -/
noncomputable def rightHomology : C := S.rightHomologyData.H
-- `S.rightHomology` is the simp normal form.
@[simp] lemma rightHomologyData_H : S.rightHomologyData.H = S.rightHomology := rfl
/-- The "opcycles" of a short complex, given by the `Q` field of a chosen right homology data.
This is the dual notion to cycles. -/
noncomputable def opcycles : C := S.rightHomologyData.Q
/-- The canonical map `S.rightHomology ⟶ S.opcycles`. -/
noncomputable def rightHomologyι : S.rightHomology ⟶ S.opcycles :=
S.rightHomologyData.ι
/-- The projection `S.X₂ ⟶ S.opcycles`. -/
noncomputable def pOpcycles : S.X₂ ⟶ S.opcycles := S.rightHomologyData.p
/-- The canonical map `S.opcycles ⟶ X₃`. -/
noncomputable def fromOpcycles : S.opcycles ⟶ S.X₃ := S.rightHomologyData.g'
@[reassoc (attr := simp)]
lemma f_pOpcycles : S.f ≫ S.pOpcycles = 0 := S.rightHomologyData.wp
@[reassoc (attr := simp)]
lemma p_fromOpcycles : S.pOpcycles ≫ S.fromOpcycles = S.g := S.rightHomologyData.p_g'
instance : Epi S.pOpcycles := by
dsimp only [pOpcycles]
infer_instance
instance : Mono S.rightHomologyι := by
dsimp only [rightHomologyι]
infer_instance
lemma rightHomology_ext_iff {A : C} (f₁ f₂ : A ⟶ S.rightHomology) :
f₁ = f₂ ↔ f₁ ≫ S.rightHomologyι = f₂ ≫ S.rightHomologyι := by
rw [cancel_mono]
@[ext]
lemma rightHomology_ext {A : C} (f₁ f₂ : A ⟶ S.rightHomology)
(h : f₁ ≫ S.rightHomologyι = f₂ ≫ S.rightHomologyι) : f₁ = f₂ := by
| simpa only [rightHomology_ext_iff]
lemma opcycles_ext_iff {A : C} (f₁ f₂ : S.opcycles ⟶ A) :
| Mathlib/Algebra/Homology/ShortComplex/RightHomology.lean | 523 | 525 |
/-
Copyright (c) 2024 Joël Riou. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Joël Riou
-/
import Mathlib.CategoryTheory.Limits.Shapes.Products
import Mathlib.CategoryTheory.Limits.Shapes.Pullback.CommSq
import Mathlib.CategoryTheory.Limits.Shapes.Pullback.HasPullback
import Mathlib.AlgebraicTopology.RelativeCellComplex.AttachCells
/-!
# Construction for the small object argument
Given a family of morphisms `f i : A i ⟶ B i` in a category `C`,
we define a functor
`SmallObject.functor f : Arrow S ⥤ Arrow S` which sends
an object given by arrow `πX : X ⟶ S` to the pushout `functorObj f πX`:
```
∐ functorObjSrcFamily f πX ⟶ X
| |
| |
v v
∐ functorObjTgtFamily f πX ⟶ functorObj f πX
```
where the morphism on the left is a coproduct (of copies of maps `f i`)
indexed by a type `FunctorObjIndex f πX` which parametrizes the
diagrams of the form
```
A i ⟶ X
| |
| |
v v
B i ⟶ S
```
The morphism `ιFunctorObj f πX : X ⟶ functorObj f πX` is part of
a natural transformation `SmallObject.ε f : 𝟭 (Arrow C) ⟶ functor f S`.
The main idea in this construction is that for any commutative square
as above, there may not exist a lifting `B i ⟶ X`, but the construction
provides a tautological morphism `B i ⟶ functorObj f πX`
(see `SmallObject.ιFunctorObj_extension`).
## References
- https://ncatlab.org/nlab/show/small+object+argument
-/
universe t w v u
namespace CategoryTheory
open Category Limits HomotopicalAlgebra
namespace SmallObject
variable {C : Type u} [Category.{v} C] {I : Type w} {A B : I → C} (f : ∀ i, A i ⟶ B i)
section
variable {S X : C} (πX : X ⟶ S)
/-- Given a family of morphisms `f i : A i ⟶ B i` and a morphism `πX : X ⟶ S`,
this type parametrizes the commutative squares with a morphism `f i` on the left
and `πX` in the right. -/
structure FunctorObjIndex where
/-- an element in the index type -/
i : I
/-- the top morphism in the square -/
t : A i ⟶ X
/-- the bottom morphism in the square -/
b : B i ⟶ S
w : t ≫ πX = f i ≫ b
attribute [reassoc (attr := simp)] FunctorObjIndex.w
variable [HasColimitsOfShape (Discrete (FunctorObjIndex f πX)) C]
/-- The family of objects `A x.i` parametrized by `x : FunctorObjIndex f πX`. -/
abbrev functorObjSrcFamily (x : FunctorObjIndex f πX) : C := A x.i
/-- The family of objects `B x.i` parametrized by `x : FunctorObjIndex f πX`. -/
abbrev functorObjTgtFamily (x : FunctorObjIndex f πX) : C := B x.i
/-- The family of the morphisms `f x.i : A x.i ⟶ B x.i`
parametrized by `x : FunctorObjIndex f πX`. -/
abbrev functorObjLeftFamily (x : FunctorObjIndex f πX) :
functorObjSrcFamily f πX x ⟶ functorObjTgtFamily f πX x := f x.i
/-- The top morphism in the pushout square in the definition of `pushoutObj f πX`. -/
noncomputable abbrev functorObjTop : ∐ functorObjSrcFamily f πX ⟶ X :=
Limits.Sigma.desc (fun x => x.t)
/-- The left morphism in the pushout square in the definition of `pushoutObj f πX`. -/
noncomputable abbrev functorObjLeft :
∐ functorObjSrcFamily f πX ⟶ ∐ functorObjTgtFamily f πX :=
Limits.Sigma.map (functorObjLeftFamily f πX)
variable [HasPushout (functorObjTop f πX) (functorObjLeft f πX)]
/-- The functor `SmallObject.functor f : Arrow C ⥤ Arrow C` that is part of
the small object argument for a family of morphisms `f`, on an object given
as a morphism `πX : X ⟶ S`. -/
noncomputable abbrev functorObj : C :=
pushout (functorObjTop f πX) (functorObjLeft f πX)
/-- The canonical morphism `X ⟶ functorObj f πX`. -/
noncomputable abbrev ιFunctorObj : X ⟶ functorObj f πX := pushout.inl _ _
/-- The canonical morphism `∐ (functorObjTgtFamily f πX) ⟶ functorObj f πX`. -/
noncomputable abbrev ρFunctorObj : ∐ functorObjTgtFamily f πX ⟶ functorObj f πX := pushout.inr _ _
@[reassoc]
lemma functorObj_comm :
functorObjTop f πX ≫ ιFunctorObj f πX = functorObjLeft f πX ≫ ρFunctorObj f πX :=
pushout.condition
lemma functorObj_isPushout :
IsPushout (functorObjTop f πX) (functorObjLeft f πX) (ιFunctorObj f πX) (ρFunctorObj f πX) :=
IsPushout.of_hasPushout _ _
@[reassoc]
lemma FunctorObjIndex.comm (x : FunctorObjIndex f πX) :
f x.i ≫ Sigma.ι (functorObjTgtFamily f πX) x ≫ ρFunctorObj f πX = x.t ≫ ιFunctorObj f πX := by
simpa using (Sigma.ι (functorObjSrcFamily f πX) x ≫= functorObj_comm f πX).symm
/-- The canonical projection on the base object. -/
noncomputable abbrev π'FunctorObj : ∐ functorObjTgtFamily f πX ⟶ S := Sigma.desc (fun x => x.b)
/-- The canonical projection on the base object. -/
noncomputable def πFunctorObj : functorObj f πX ⟶ S :=
pushout.desc πX (π'FunctorObj f πX) (by ext; simp [π'FunctorObj])
@[reassoc (attr := simp)]
lemma ρFunctorObj_π : ρFunctorObj f πX ≫ πFunctorObj f πX = π'FunctorObj f πX := by
simp [πFunctorObj]
@[reassoc (attr := simp)]
lemma ιFunctorObj_πFunctorObj : ιFunctorObj f πX ≫ πFunctorObj f πX = πX := by
simp [ιFunctorObj, πFunctorObj]
/-- The morphism `ιFunctorObj f πX : X ⟶ functorObj f πX` is obtained by
attaching `f`-cells. -/
@[simps]
noncomputable def attachCellsιFunctorObj :
AttachCells.{max v w} f (ιFunctorObj f πX) where
ι := FunctorObjIndex f πX
π x := x.i
isColimit₁ := coproductIsCoproduct _
isColimit₂ := coproductIsCoproduct _
m := functorObjLeft f πX
g₁ := functorObjTop f πX
g₂ := ρFunctorObj f πX
isPushout := IsPushout.of_hasPushout (functorObjTop f πX) (functorObjLeft f πX)
cofan₁ := _
cofan₂ := _
section Small
variable [LocallySmall.{t} C] [Small.{t} I]
instance : Small.{t} (FunctorObjIndex f πX) := by
let φ (x : FunctorObjIndex f πX) :
Σ (i : Shrink.{t} I),
Shrink.{t} ((A ((equivShrink _).symm i) ⟶ X) ×
(B ((equivShrink _).symm i) ⟶ S)) :=
⟨equivShrink _ x.i, equivShrink _
⟨eqToHom (by simp) ≫ x.t, eqToHom (by simp) ≫ x.b⟩⟩
have hφ : Function.Injective φ := by
rintro ⟨i₁, t₁, b₁, _⟩ ⟨i₂, t₂, b₂, _⟩ h
| obtain rfl : i₁ = i₂ := by simpa [φ] using congr_arg Sigma.fst h
simpa [cancel_epi, φ] using h
exact small_of_injective hφ
instance : Small.{t} (attachCellsιFunctorObj f πX).ι := by
dsimp
infer_instance
| Mathlib/CategoryTheory/SmallObject/Construction.lean | 171 | 178 |
/-
Copyright (c) 2018 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes
-/
import Mathlib.Algebra.CharP.Basic
import Mathlib.Algebra.Module.End
import Mathlib.Algebra.Ring.Prod
import Mathlib.Data.Fintype.Units
import Mathlib.GroupTheory.GroupAction.SubMulAction
import Mathlib.GroupTheory.OrderOfElement
import Mathlib.Tactic.FinCases
/-!
# Integers mod `n`
Definition of the integers mod n, and the field structure on the integers mod p.
## Definitions
* `ZMod n`, which is for integers modulo a nat `n : ℕ`
* `val a` is defined as a natural number:
- for `a : ZMod 0` it is the absolute value of `a`
- for `a : ZMod n` with `0 < n` it is the least natural number in the equivalence class
* A coercion `cast` is defined from `ZMod n` into any ring.
This is a ring hom if the ring has characteristic dividing `n`
-/
assert_not_exists Field Submodule TwoSidedIdeal
open Function ZMod
namespace ZMod
/-- For non-zero `n : ℕ`, the ring `Fin n` is equivalent to `ZMod n`. -/
def finEquiv : ∀ (n : ℕ) [NeZero n], Fin n ≃+* ZMod n
| 0, h => (h.ne _ rfl).elim
| _ + 1, _ => .refl _
instance charZero : CharZero (ZMod 0) := inferInstanceAs (CharZero ℤ)
/-- `val a` is a natural number defined as:
- for `a : ZMod 0` it is the absolute value of `a`
- for `a : ZMod n` with `0 < n` it is the least natural number in the equivalence class
See `ZMod.valMinAbs` for a variant that takes values in the integers.
-/
| def val : ∀ {n : ℕ}, ZMod n → ℕ
| 0 => Int.natAbs
| n + 1 => ((↑) : Fin (n + 1) → ℕ)
| Mathlib/Data/ZMod/Basic.lean | 52 | 55 |
/-
Copyright (c) 2024 Christian Merten. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Christian Merten, Andrew Yang
-/
import Mathlib.AlgebraicGeometry.Morphisms.ClosedImmersion
import Mathlib.AlgebraicGeometry.PullbackCarrier
import Mathlib.CategoryTheory.Limits.Constructions.Over.Basic
import Mathlib.CategoryTheory.Limits.Constructions.Over.Products
import Mathlib.CategoryTheory.Limits.Shapes.Pullback.Equalizer
/-!
# Separated morphisms
A morphism of schemes is separated if its diagonal morphism is a closed immmersion.
## Main definitions
- `AlgebraicGeometry.IsSeparated`: The class of separated morphisms.
- `AlgebraicGeometry.Scheme.IsSeparated`: The class of separated schemes.
- `AlgebraicGeometry.IsSeparated.hasAffineProperty`:
A morphism is separated iff the preimage of affine opens are separated schemes.
-/
noncomputable section
open CategoryTheory CategoryTheory.Limits Opposite TopologicalSpace
universe u
open scoped AlgebraicGeometry
namespace AlgebraicGeometry
variable {W X Y Z : Scheme.{u}} (f : X ⟶ Y) (g : Y ⟶ Z)
/-- A morphism is separated if the diagonal map is a closed immersion. -/
@[mk_iff]
class IsSeparated : Prop where
/-- A morphism is separated if the diagonal map is a closed immersion. -/
diagonal_isClosedImmersion : IsClosedImmersion (pullback.diagonal f) := by infer_instance
namespace IsSeparated
attribute [instance] diagonal_isClosedImmersion
theorem isSeparated_eq_diagonal_isClosedImmersion :
| @IsSeparated = MorphismProperty.diagonal @IsClosedImmersion := by
ext
exact isSeparated_iff _
| Mathlib/AlgebraicGeometry/Morphisms/Separated.lean | 49 | 52 |
/-
Copyright (c) 2022 Anne Baanen. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Anne Baanen
-/
import Mathlib.Algebra.Polynomial.AlgebraMap
import Mathlib.FieldTheory.Minpoly.IsIntegrallyClosed
import Mathlib.RingTheory.PowerBasis
/-!
# A predicate on adjoining roots of polynomial
This file defines a predicate `IsAdjoinRoot S f`, which states that the ring `S` can be
constructed by adjoining a specified root of the polynomial `f : R[X]` to `R`.
This predicate is useful when the same ring can be generated by adjoining the root of different
polynomials, and you want to vary which polynomial you're considering.
The results in this file are intended to mirror those in `RingTheory.AdjoinRoot`,
in order to provide an easier way to translate results from one to the other.
## Motivation
`AdjoinRoot` presents one construction of a ring `R[α]`. However, it is possible to obtain
rings of this form in many ways, such as `NumberField.ringOfIntegers ℚ(√-5)`,
or `Algebra.adjoin R {α, α^2}`, or `IntermediateField.adjoin R {α, 2 - α}`,
or even if we want to view `ℂ` as adjoining a root of `X^2 + 1` to `ℝ`.
## Main definitions
The two main predicates in this file are:
* `IsAdjoinRoot S f`: `S` is generated by adjoining a specified root of `f : R[X]` to `R`
* `IsAdjoinRootMonic S f`: `S` is generated by adjoining a root of the monic polynomial
`f : R[X]` to `R`
Using `IsAdjoinRoot` to map into `S`:
* `IsAdjoinRoot.map`: inclusion from `R[X]` to `S`
* `IsAdjoinRoot.root`: the specific root adjoined to `R` to give `S`
Using `IsAdjoinRoot` to map out of `S`:
* `IsAdjoinRoot.repr`: choose a non-unique representative in `R[X]`
* `IsAdjoinRoot.lift`, `IsAdjoinRoot.liftHom`: lift a morphism `R →+* T` to `S →+* T`
* `IsAdjoinRootMonic.modByMonicHom`: a unique representative in `R[X]` if `f` is monic
## Main results
* `AdjoinRoot.isAdjoinRoot` and `AdjoinRoot.isAdjoinRootMonic`:
`AdjoinRoot` satisfies the conditions on `IsAdjoinRoot`(`_monic`)
* `IsAdjoinRootMonic.powerBasis`: the `root` generates a power basis on `S` over `R`
* `IsAdjoinRoot.aequiv`: algebra isomorphism showing adjoining a root gives a unique ring
up to isomorphism
* `IsAdjoinRoot.ofEquiv`: transfer `IsAdjoinRoot` across an algebra isomorphism
* `IsAdjoinRootMonic.minpoly_eq`: the minimal polynomial of the adjoined root of `f` is equal to
`f`, if `f` is irreducible and monic, and `R` is a GCD domain
-/
open scoped Polynomial
open Polynomial
noncomputable section
universe u v
-- Porting note: this looks like something that should not be here
-- section MoveMe
--
-- end MoveMe
-- This class doesn't really make sense on a predicate
/-- `IsAdjoinRoot S f` states that the ring `S` can be constructed by adjoining a specified root
of the polynomial `f : R[X]` to `R`.
Compare `PowerBasis R S`, which does not explicitly specify which polynomial we adjoin a root of
(in particular `f` does not need to be the minimal polynomial of the root we adjoin),
and `AdjoinRoot` which constructs a new type.
This is not a typeclass because the choice of root given `S` and `f` is not unique.
-/
structure IsAdjoinRoot {R : Type u} (S : Type v) [CommSemiring R] [Semiring S] [Algebra R S]
(f : R[X]) : Type max u v where
map : R[X] →+* S
map_surjective : Function.Surjective map
ker_map : RingHom.ker map = Ideal.span {f}
algebraMap_eq : algebraMap R S = map.comp Polynomial.C
-- This class doesn't really make sense on a predicate
/-- `IsAdjoinRootMonic S f` states that the ring `S` can be constructed by adjoining a specified
root of the monic polynomial `f : R[X]` to `R`.
As long as `f` is monic, there is a well-defined representation of elements of `S` as polynomials
in `R[X]` of degree lower than `deg f` (see `modByMonicHom` and `coeff`). In particular,
we have `IsAdjoinRootMonic.powerBasis`.
Bundling `Monic` into this structure is very useful when working with explicit `f`s such as
`X^2 - C a * X - C b` since it saves you carrying around the proofs of monicity.
-/
-- @[nolint has_nonempty_instance] -- Porting note: This linter does not exist yet.
structure IsAdjoinRootMonic {R : Type u} (S : Type v) [CommSemiring R] [Semiring S] [Algebra R S]
(f : R[X]) extends IsAdjoinRoot S f where
Monic : Monic f
section Ring
variable {R : Type u} {S : Type v} [CommRing R] [Ring S] {f : R[X]} [Algebra R S]
namespace IsAdjoinRoot
/-- `(h : IsAdjoinRoot S f).root` is the root of `f` that can be adjoined to generate `S`. -/
def root (h : IsAdjoinRoot S f) : S :=
h.map X
theorem subsingleton (h : IsAdjoinRoot S f) [Subsingleton R] : Subsingleton S :=
h.map_surjective.subsingleton
theorem algebraMap_apply (h : IsAdjoinRoot S f) (x : R) :
algebraMap R S x = h.map (Polynomial.C x) := by rw [h.algebraMap_eq, RingHom.comp_apply]
theorem mem_ker_map (h : IsAdjoinRoot S f) {p} : p ∈ RingHom.ker h.map ↔ f ∣ p := by
rw [h.ker_map, Ideal.mem_span_singleton]
@[simp]
theorem map_eq_zero_iff (h : IsAdjoinRoot S f) {p} : h.map p = 0 ↔ f ∣ p := by
rw [← h.mem_ker_map, RingHom.mem_ker]
@[simp]
theorem map_X (h : IsAdjoinRoot S f) : h.map X = h.root := rfl
@[simp]
theorem map_self (h : IsAdjoinRoot S f) : h.map f = 0 := h.map_eq_zero_iff.mpr dvd_rfl
@[simp]
theorem aeval_eq (h : IsAdjoinRoot S f) (p : R[X]) : aeval h.root p = h.map p :=
Polynomial.induction_on p (fun x => by rw [aeval_C, h.algebraMap_apply])
(fun p q ihp ihq => by rw [map_add, RingHom.map_add, ihp, ihq]) fun n x _ => by
rw [map_mul, aeval_C, map_pow, aeval_X, RingHom.map_mul, ← h.algebraMap_apply,
RingHom.map_pow, map_X]
theorem aeval_root (h : IsAdjoinRoot S f) : aeval h.root f = 0 := by rw [aeval_eq, map_self]
/-- Choose an arbitrary representative so that `h.map (h.repr x) = x`.
If `f` is monic, use `IsAdjoinRootMonic.modByMonicHom` for a unique choice of representative.
-/
def repr (h : IsAdjoinRoot S f) (x : S) : R[X] :=
(h.map_surjective x).choose
theorem map_repr (h : IsAdjoinRoot S f) (x : S) : h.map (h.repr x) = x :=
(h.map_surjective x).choose_spec
/-- `repr` preserves zero, up to multiples of `f` -/
theorem repr_zero_mem_span (h : IsAdjoinRoot S f) : h.repr 0 ∈ Ideal.span ({f} : Set R[X]) := by
rw [← h.ker_map, RingHom.mem_ker, h.map_repr]
/-- `repr` preserves addition, up to multiples of `f` -/
theorem repr_add_sub_repr_add_repr_mem_span (h : IsAdjoinRoot S f) (x y : S) :
h.repr (x + y) - (h.repr x + h.repr y) ∈ Ideal.span ({f} : Set R[X]) := by
rw [← h.ker_map, RingHom.mem_ker, map_sub, h.map_repr, map_add, h.map_repr, h.map_repr, sub_self]
/-- Extensionality of the `IsAdjoinRoot` structure itself. See `IsAdjoinRootMonic.ext_elem`
for extensionality of the ring elements. -/
theorem ext_map (h h' : IsAdjoinRoot S f) (eq : ∀ x, h.map x = h'.map x) : h = h' := by
cases h; cases h'; congr
exact RingHom.ext eq
/-- Extensionality of the `IsAdjoinRoot` structure itself. See `IsAdjoinRootMonic.ext_elem`
for extensionality of the ring elements. -/
@[ext]
theorem ext (h h' : IsAdjoinRoot S f) (eq : h.root = h'.root) : h = h' :=
h.ext_map h' fun x => by rw [← h.aeval_eq, ← h'.aeval_eq, eq]
section lift
variable {T : Type*} [CommRing T] {i : R →+* T} {x : T}
section
variable (hx : f.eval₂ i x = 0)
include hx
/-- Auxiliary lemma for `IsAdjoinRoot.lift` -/
theorem eval₂_repr_eq_eval₂_of_map_eq (h : IsAdjoinRoot S f) (z : S) (w : R[X])
(hzw : h.map w = z) : (h.repr z).eval₂ i x = w.eval₂ i x := by
rw [eq_comm, ← sub_eq_zero, ← h.map_repr z, ← map_sub, h.map_eq_zero_iff] at hzw
obtain ⟨y, hy⟩ := hzw
rw [← sub_eq_zero, ← eval₂_sub, hy, eval₂_mul, hx, zero_mul]
variable (i x)
-- To match `AdjoinRoot.lift`
/-- Lift a ring homomorphism `R →+* T` to `S →+* T` by specifying a root `x` of `f` in `T`,
where `S` is given by adjoining a root of `f` to `R`. -/
def lift (h : IsAdjoinRoot S f) (hx : f.eval₂ i x = 0) : S →+* T where
toFun z := (h.repr z).eval₂ i x
map_zero' := by
rw [h.eval₂_repr_eq_eval₂_of_map_eq hx _ _ (map_zero _), eval₂_zero]
map_add' z w := by
rw [h.eval₂_repr_eq_eval₂_of_map_eq hx _ (h.repr z + h.repr w), eval₂_add]
rw [map_add, map_repr, map_repr]
map_one' := by
rw [h.eval₂_repr_eq_eval₂_of_map_eq hx _ _ (map_one _), eval₂_one]
map_mul' z w := by
rw [h.eval₂_repr_eq_eval₂_of_map_eq hx _ (h.repr z * h.repr w), eval₂_mul]
rw [map_mul, map_repr, map_repr]
variable {i x}
@[simp]
theorem lift_map (h : IsAdjoinRoot S f) (z : R[X]) : h.lift i x hx (h.map z) = z.eval₂ i x := by
rw [lift, RingHom.coe_mk]
dsimp
rw [h.eval₂_repr_eq_eval₂_of_map_eq hx _ _ rfl]
@[simp]
theorem lift_root (h : IsAdjoinRoot S f) : h.lift i x hx h.root = x := by
rw [← h.map_X, lift_map, eval₂_X]
@[simp]
theorem lift_algebraMap (h : IsAdjoinRoot S f) (a : R) :
h.lift i x hx (algebraMap R S a) = i a := by rw [h.algebraMap_apply, lift_map, eval₂_C]
/-- Auxiliary lemma for `apply_eq_lift` -/
theorem apply_eq_lift (h : IsAdjoinRoot S f) (g : S →+* T) (hmap : ∀ a, g (algebraMap R S a) = i a)
(hroot : g h.root = x) (a : S) : g a = h.lift i x hx a := by
rw [← h.map_repr a, Polynomial.as_sum_range_C_mul_X_pow (h.repr a)]
simp only [map_sum, map_mul, map_pow, h.map_X, hroot, ← h.algebraMap_apply, hmap, lift_root,
lift_algebraMap]
/-- Unicity of `lift`: a map that agrees on `R` and `h.root` agrees with `lift` everywhere. -/
theorem eq_lift (h : IsAdjoinRoot S f) (g : S →+* T) (hmap : ∀ a, g (algebraMap R S a) = i a)
(hroot : g h.root = x) : g = h.lift i x hx :=
RingHom.ext (h.apply_eq_lift hx g hmap hroot)
end
variable [Algebra R T] (hx' : aeval x f = 0)
variable (x) in
-- To match `AdjoinRoot.liftHom`
/-- Lift the algebra map `R → T` to `S →ₐ[R] T` by specifying a root `x` of `f` in `T`,
where `S` is given by adjoining a root of `f` to `R`. -/
def liftHom (h : IsAdjoinRoot S f) : S →ₐ[R] T :=
{ h.lift (algebraMap R T) x hx' with commutes' := fun a => h.lift_algebraMap hx' a }
@[simp]
theorem coe_liftHom (h : IsAdjoinRoot S f) :
(h.liftHom x hx' : S →+* T) = h.lift (algebraMap R T) x hx' := rfl
theorem lift_algebraMap_apply (h : IsAdjoinRoot S f) (z : S) :
h.lift (algebraMap R T) x hx' z = h.liftHom x hx' z := rfl
|
@[simp]
theorem liftHom_map (h : IsAdjoinRoot S f) (z : R[X]) : h.liftHom x hx' (h.map z) = aeval x z := by
rw [← lift_algebraMap_apply, lift_map, aeval_def]
| Mathlib/RingTheory/IsAdjoinRoot.lean | 253 | 257 |
/-
Copyright (c) 2015 Microsoft Corporation. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Leonardo de Moura, Jeremy Avigad, Minchao Wu, Mario Carneiro
-/
import Mathlib.Data.Finset.Attach
import Mathlib.Data.Finset.Disjoint
import Mathlib.Data.Finset.Erase
import Mathlib.Data.Finset.Filter
import Mathlib.Data.Finset.Range
import Mathlib.Data.Finset.SDiff
import Mathlib.Data.Multiset.Basic
import Mathlib.Logic.Equiv.Set
import Mathlib.Order.Directed
import Mathlib.Order.Interval.Set.Defs
import Mathlib.Data.Set.SymmDiff
/-!
# Basic lemmas on finite sets
This file contains lemmas on the interaction of various definitions on the `Finset` type.
For an explanation of `Finset` design decisions, please see `Mathlib/Data/Finset/Defs.lean`.
## Main declarations
### Main definitions
* `Finset.choose`: Given a proof `h` of existence and uniqueness of a certain element
satisfying a predicate, `choose s h` returns the element of `s` satisfying that predicate.
### Equivalences between finsets
* The `Mathlib/Logic/Equiv/Defs.lean` file describes a general type of equivalence, so look in there
for any lemmas. There is some API for rewriting sums and products from `s` to `t` given that
`s ≃ t`.
TODO: examples
## Tags
finite sets, finset
-/
-- Assert that we define `Finset` without the material on `List.sublists`.
-- Note that we cannot use `List.sublists` itself as that is defined very early.
assert_not_exists List.sublistsLen Multiset.powerset CompleteLattice Monoid
open Multiset Subtype Function
universe u
variable {α : Type*} {β : Type*} {γ : Type*}
namespace Finset
-- TODO: these should be global attributes, but this will require fixing other files
attribute [local trans] Subset.trans Superset.trans
set_option linter.deprecated false in
@[deprecated "Deprecated without replacement." (since := "2025-02-07")]
theorem sizeOf_lt_sizeOf_of_mem [SizeOf α] {x : α} {s : Finset α} (hx : x ∈ s) :
SizeOf.sizeOf x < SizeOf.sizeOf s := by
cases s
dsimp [SizeOf.sizeOf, SizeOf.sizeOf, Multiset.sizeOf]
rw [Nat.add_comm]
refine lt_trans ?_ (Nat.lt_succ_self _)
exact Multiset.sizeOf_lt_sizeOf_of_mem hx
/-! ### Lattice structure -/
section Lattice
variable [DecidableEq α] {s s₁ s₂ t t₁ t₂ u v : Finset α} {a b : α}
/-! #### union -/
@[simp]
theorem disjUnion_eq_union (s t h) : @disjUnion α s t h = s ∪ t :=
ext fun a => by simp
@[simp]
theorem disjoint_union_left : Disjoint (s ∪ t) u ↔ Disjoint s u ∧ Disjoint t u := by
simp only [disjoint_left, mem_union, or_imp, forall_and]
@[simp]
theorem disjoint_union_right : Disjoint s (t ∪ u) ↔ Disjoint s t ∧ Disjoint s u := by
simp only [disjoint_right, mem_union, or_imp, forall_and]
/-! #### inter -/
theorem not_disjoint_iff_nonempty_inter : ¬Disjoint s t ↔ (s ∩ t).Nonempty :=
not_disjoint_iff.trans <| by simp [Finset.Nonempty]
alias ⟨_, Nonempty.not_disjoint⟩ := not_disjoint_iff_nonempty_inter
theorem disjoint_or_nonempty_inter (s t : Finset α) : Disjoint s t ∨ (s ∩ t).Nonempty := by
rw [← not_disjoint_iff_nonempty_inter]
exact em _
omit [DecidableEq α] in
theorem disjoint_of_subset_iff_left_eq_empty (h : s ⊆ t) :
Disjoint s t ↔ s = ∅ :=
disjoint_of_le_iff_left_eq_bot h
lemma pairwiseDisjoint_iff {ι : Type*} {s : Set ι} {f : ι → Finset α} :
s.PairwiseDisjoint f ↔ ∀ ⦃i⦄, i ∈ s → ∀ ⦃j⦄, j ∈ s → (f i ∩ f j).Nonempty → i = j := by
simp [Set.PairwiseDisjoint, Set.Pairwise, Function.onFun, not_imp_comm (a := _ = _),
not_disjoint_iff_nonempty_inter]
end Lattice
instance isDirected_le : IsDirected (Finset α) (· ≤ ·) := by classical infer_instance
instance isDirected_subset : IsDirected (Finset α) (· ⊆ ·) := isDirected_le
/-! ### erase -/
section Erase
variable [DecidableEq α] {s t u v : Finset α} {a b : α}
@[simp]
theorem erase_empty (a : α) : erase ∅ a = ∅ :=
rfl
protected lemma Nontrivial.erase_nonempty (hs : s.Nontrivial) : (s.erase a).Nonempty :=
(hs.exists_ne a).imp <| by aesop
@[simp] lemma erase_nonempty (ha : a ∈ s) : (s.erase a).Nonempty ↔ s.Nontrivial := by
simp only [Finset.Nonempty, mem_erase, and_comm (b := _ ∈ _)]
refine ⟨?_, fun hs ↦ hs.exists_ne a⟩
rintro ⟨b, hb, hba⟩
exact ⟨_, hb, _, ha, hba⟩
@[simp]
theorem erase_singleton (a : α) : ({a} : Finset α).erase a = ∅ := by
ext x
simp
@[simp]
theorem erase_insert_eq_erase (s : Finset α) (a : α) : (insert a s).erase a = s.erase a :=
ext fun x => by
simp +contextual only [mem_erase, mem_insert, and_congr_right_iff,
false_or, iff_self, imp_true_iff]
theorem erase_insert {a : α} {s : Finset α} (h : a ∉ s) : erase (insert a s) a = s := by
rw [erase_insert_eq_erase, erase_eq_of_not_mem h]
theorem erase_insert_of_ne {a b : α} {s : Finset α} (h : a ≠ b) :
erase (insert a s) b = insert a (erase s b) :=
ext fun x => by
have : x ≠ b ∧ x = a ↔ x = a := and_iff_right_of_imp fun hx => hx.symm ▸ h
simp only [mem_erase, mem_insert, and_or_left, this]
theorem erase_cons_of_ne {a b : α} {s : Finset α} (ha : a ∉ s) (hb : a ≠ b) :
erase (cons a s ha) b = cons a (erase s b) fun h => ha <| erase_subset _ _ h := by
simp only [cons_eq_insert, erase_insert_of_ne hb]
@[simp] theorem insert_erase (h : a ∈ s) : insert a (erase s a) = s :=
ext fun x => by
simp only [mem_insert, mem_erase, or_and_left, dec_em, true_and]
apply or_iff_right_of_imp
rintro rfl
exact h
lemma erase_eq_iff_eq_insert (hs : a ∈ s) (ht : a ∉ t) : erase s a = t ↔ s = insert a t := by
aesop
lemma insert_erase_invOn :
Set.InvOn (insert a) (fun s ↦ erase s a) {s : Finset α | a ∈ s} {s : Finset α | a ∉ s} :=
⟨fun _s ↦ insert_erase, fun _s ↦ erase_insert⟩
theorem erase_ssubset {a : α} {s : Finset α} (h : a ∈ s) : s.erase a ⊂ s :=
calc
s.erase a ⊂ insert a (s.erase a) := ssubset_insert <| not_mem_erase _ _
_ = _ := insert_erase h
theorem ssubset_iff_exists_subset_erase {s t : Finset α} : s ⊂ t ↔ ∃ a ∈ t, s ⊆ t.erase a := by
refine ⟨fun h => ?_, fun ⟨a, ha, h⟩ => ssubset_of_subset_of_ssubset h <| erase_ssubset ha⟩
obtain ⟨a, ht, hs⟩ := not_subset.1 h.2
exact ⟨a, ht, subset_erase.2 ⟨h.1, hs⟩⟩
theorem erase_ssubset_insert (s : Finset α) (a : α) : s.erase a ⊂ insert a s :=
ssubset_iff_exists_subset_erase.2
⟨a, mem_insert_self _ _, erase_subset_erase _ <| subset_insert _ _⟩
theorem erase_cons {s : Finset α} {a : α} (h : a ∉ s) : (s.cons a h).erase a = s := by
rw [cons_eq_insert, erase_insert_eq_erase, erase_eq_of_not_mem h]
theorem subset_insert_iff {a : α} {s t : Finset α} : s ⊆ insert a t ↔ erase s a ⊆ t := by
simp only [subset_iff, or_iff_not_imp_left, mem_erase, mem_insert, and_imp]
exact forall_congr' fun x => forall_swap
theorem erase_insert_subset (a : α) (s : Finset α) : erase (insert a s) a ⊆ s :=
subset_insert_iff.1 <| Subset.rfl
theorem insert_erase_subset (a : α) (s : Finset α) : s ⊆ insert a (erase s a) :=
subset_insert_iff.2 <| Subset.rfl
theorem subset_insert_iff_of_not_mem (h : a ∉ s) : s ⊆ insert a t ↔ s ⊆ t := by
rw [subset_insert_iff, erase_eq_of_not_mem h]
theorem erase_subset_iff_of_mem (h : a ∈ t) : s.erase a ⊆ t ↔ s ⊆ t := by
rw [← subset_insert_iff, insert_eq_of_mem h]
theorem erase_injOn' (a : α) : { s : Finset α | a ∈ s }.InjOn fun s => erase s a :=
fun s hs t ht (h : s.erase a = _) => by rw [← insert_erase hs, ← insert_erase ht, h]
end Erase
lemma Nontrivial.exists_cons_eq {s : Finset α} (hs : s.Nontrivial) :
∃ t a ha b hb hab, (cons b t hb).cons a (mem_cons.not.2 <| not_or_intro hab ha) = s := by
classical
obtain ⟨a, ha, b, hb, hab⟩ := hs
have : b ∈ s.erase a := mem_erase.2 ⟨hab.symm, hb⟩
refine ⟨(s.erase a).erase b, a, ?_, b, ?_, ?_, ?_⟩ <;>
simp [insert_erase this, insert_erase ha, *]
/-! ### sdiff -/
section Sdiff
variable [DecidableEq α] {s t u v : Finset α} {a b : α}
lemma erase_sdiff_erase (hab : a ≠ b) (hb : b ∈ s) : s.erase a \ s.erase b = {b} := by
ext; aesop
-- TODO: Do we want to delete this lemma and `Finset.disjUnion_singleton`,
-- or instead add `Finset.union_singleton`/`Finset.singleton_union`?
theorem sdiff_singleton_eq_erase (a : α) (s : Finset α) : s \ {a} = erase s a := by
ext
rw [mem_erase, mem_sdiff, mem_singleton, and_comm]
-- This lemma matches `Finset.insert_eq` in functionality.
theorem erase_eq (s : Finset α) (a : α) : s.erase a = s \ {a} :=
(sdiff_singleton_eq_erase _ _).symm
theorem disjoint_erase_comm : Disjoint (s.erase a) t ↔ Disjoint s (t.erase a) := by
simp_rw [erase_eq, disjoint_sdiff_comm]
lemma disjoint_insert_erase (ha : a ∉ t) : Disjoint (s.erase a) (insert a t) ↔ Disjoint s t := by
rw [disjoint_erase_comm, erase_insert ha]
lemma disjoint_erase_insert (ha : a ∉ s) : Disjoint (insert a s) (t.erase a) ↔ Disjoint s t := by
rw [← disjoint_erase_comm, erase_insert ha]
theorem disjoint_of_erase_left (ha : a ∉ t) (hst : Disjoint (s.erase a) t) : Disjoint s t := by
rw [← erase_insert ha, ← disjoint_erase_comm, disjoint_insert_right]
exact ⟨not_mem_erase _ _, hst⟩
theorem disjoint_of_erase_right (ha : a ∉ s) (hst : Disjoint s (t.erase a)) : Disjoint s t := by
rw [← erase_insert ha, disjoint_erase_comm, disjoint_insert_left]
exact ⟨not_mem_erase _ _, hst⟩
theorem inter_erase (a : α) (s t : Finset α) : s ∩ t.erase a = (s ∩ t).erase a := by
simp only [erase_eq, inter_sdiff_assoc]
@[simp]
theorem erase_inter (a : α) (s t : Finset α) : s.erase a ∩ t = (s ∩ t).erase a := by
simpa only [inter_comm t] using inter_erase a t s
theorem erase_sdiff_comm (s t : Finset α) (a : α) : s.erase a \ t = (s \ t).erase a := by
simp_rw [erase_eq, sdiff_right_comm]
theorem erase_inter_comm (s t : Finset α) (a : α) : s.erase a ∩ t = s ∩ t.erase a := by
rw [erase_inter, inter_erase]
theorem erase_union_distrib (s t : Finset α) (a : α) : (s ∪ t).erase a = s.erase a ∪ t.erase a := by
simp_rw [erase_eq, union_sdiff_distrib]
theorem insert_inter_distrib (s t : Finset α) (a : α) :
insert a (s ∩ t) = insert a s ∩ insert a t := by simp_rw [insert_eq, union_inter_distrib_left]
theorem erase_sdiff_distrib (s t : Finset α) (a : α) : (s \ t).erase a = s.erase a \ t.erase a := by
simp_rw [erase_eq, sdiff_sdiff, sup_sdiff_eq_sup le_rfl, sup_comm]
theorem erase_union_of_mem (ha : a ∈ t) (s : Finset α) : s.erase a ∪ t = s ∪ t := by
rw [← insert_erase (mem_union_right s ha), erase_union_distrib, ← union_insert, insert_erase ha]
theorem union_erase_of_mem (ha : a ∈ s) (t : Finset α) : s ∪ t.erase a = s ∪ t := by
rw [← insert_erase (mem_union_left t ha), erase_union_distrib, ← insert_union, insert_erase ha]
theorem sdiff_union_erase_cancel (hts : t ⊆ s) (ha : a ∈ t) : s \ t ∪ t.erase a = s.erase a := by
simp_rw [erase_eq, sdiff_union_sdiff_cancel hts (singleton_subset_iff.2 ha)]
theorem sdiff_insert (s t : Finset α) (x : α) : s \ insert x t = (s \ t).erase x := by
simp_rw [← sdiff_singleton_eq_erase, insert_eq, sdiff_sdiff_left', sdiff_union_distrib,
inter_comm]
theorem sdiff_insert_insert_of_mem_of_not_mem {s t : Finset α} {x : α} (hxs : x ∈ s) (hxt : x ∉ t) :
insert x (s \ insert x t) = s \ t := by
rw [sdiff_insert, insert_erase (mem_sdiff.mpr ⟨hxs, hxt⟩)]
theorem sdiff_erase (h : a ∈ s) : s \ t.erase a = insert a (s \ t) := by
rw [← sdiff_singleton_eq_erase, sdiff_sdiff_eq_sdiff_union (singleton_subset_iff.2 h), insert_eq,
union_comm]
theorem sdiff_erase_self (ha : a ∈ s) : s \ s.erase a = {a} := by
rw [sdiff_erase ha, Finset.sdiff_self, insert_empty_eq]
theorem erase_eq_empty_iff (s : Finset α) (a : α) : s.erase a = ∅ ↔ s = ∅ ∨ s = {a} := by
rw [← sdiff_singleton_eq_erase, sdiff_eq_empty_iff_subset, subset_singleton_iff]
--TODO@Yaël: Kill lemmas duplicate with `BooleanAlgebra`
theorem sdiff_disjoint : Disjoint (t \ s) s :=
disjoint_left.2 fun _a ha => (mem_sdiff.1 ha).2
theorem disjoint_sdiff : Disjoint s (t \ s) :=
sdiff_disjoint.symm
theorem disjoint_sdiff_inter (s t : Finset α) : Disjoint (s \ t) (s ∩ t) :=
disjoint_of_subset_right inter_subset_right sdiff_disjoint
end Sdiff
/-! ### attach -/
@[simp]
theorem attach_empty : attach (∅ : Finset α) = ∅ :=
rfl
@[simp]
theorem attach_nonempty_iff {s : Finset α} : s.attach.Nonempty ↔ s.Nonempty := by
simp [Finset.Nonempty]
@[aesop safe apply (rule_sets := [finsetNonempty])]
protected alias ⟨_, Nonempty.attach⟩ := attach_nonempty_iff
@[simp]
theorem attach_eq_empty_iff {s : Finset α} : s.attach = ∅ ↔ s = ∅ := by
simp [eq_empty_iff_forall_not_mem]
/-! ### filter -/
section Filter
variable (p q : α → Prop) [DecidablePred p] [DecidablePred q] {s t : Finset α}
theorem filter_singleton (a : α) : filter p {a} = if p a then {a} else ∅ := by
classical
ext x
simp only [mem_singleton, forall_eq, mem_filter]
split_ifs with h <;> by_cases h' : x = a <;> simp [h, h']
theorem filter_cons_of_pos (a : α) (s : Finset α) (ha : a ∉ s) (hp : p a) :
filter p (cons a s ha) = cons a (filter p s) ((mem_of_mem_filter _).mt ha) :=
eq_of_veq <| Multiset.filter_cons_of_pos s.val hp
theorem filter_cons_of_neg (a : α) (s : Finset α) (ha : a ∉ s) (hp : ¬p a) :
filter p (cons a s ha) = filter p s :=
eq_of_veq <| Multiset.filter_cons_of_neg s.val hp
theorem disjoint_filter {s : Finset α} {p q : α → Prop} [DecidablePred p] [DecidablePred q] :
Disjoint (s.filter p) (s.filter q) ↔ ∀ x ∈ s, p x → ¬q x := by
constructor <;> simp +contextual [disjoint_left]
theorem disjoint_filter_filter' (s t : Finset α)
{p q : α → Prop} [DecidablePred p] [DecidablePred q] (h : Disjoint p q) :
Disjoint (s.filter p) (t.filter q) := by
simp_rw [disjoint_left, mem_filter]
rintro a ⟨_, hp⟩ ⟨_, hq⟩
rw [Pi.disjoint_iff] at h
simpa [hp, hq] using h a
theorem disjoint_filter_filter_neg (s t : Finset α) (p : α → Prop)
[DecidablePred p] [∀ x, Decidable (¬p x)] :
Disjoint (s.filter p) (t.filter fun a => ¬p a) :=
disjoint_filter_filter' s t disjoint_compl_right
theorem filter_disj_union (s : Finset α) (t : Finset α) (h : Disjoint s t) :
filter p (disjUnion s t h) = (filter p s).disjUnion (filter p t) (disjoint_filter_filter h) :=
eq_of_veq <| Multiset.filter_add _ _ _
theorem filter_cons {a : α} (s : Finset α) (ha : a ∉ s) :
filter p (cons a s ha) =
if p a then cons a (filter p s) ((mem_of_mem_filter _).mt ha) else filter p s := by
split_ifs with h
· rw [filter_cons_of_pos _ _ _ ha h]
· rw [filter_cons_of_neg _ _ _ ha h]
section
variable [DecidableEq α]
theorem filter_union (s₁ s₂ : Finset α) : (s₁ ∪ s₂).filter p = s₁.filter p ∪ s₂.filter p :=
ext fun _ => by simp only [mem_filter, mem_union, or_and_right]
theorem filter_union_right (s : Finset α) : s.filter p ∪ s.filter q = s.filter fun x => p x ∨ q x :=
ext fun x => by simp [mem_filter, mem_union, ← and_or_left]
theorem filter_mem_eq_inter {s t : Finset α} [∀ i, Decidable (i ∈ t)] :
(s.filter fun i => i ∈ t) = s ∩ t :=
ext fun i => by simp [mem_filter, mem_inter]
theorem filter_inter_distrib (s t : Finset α) : (s ∩ t).filter p = s.filter p ∩ t.filter p := by
ext
simp [mem_filter, mem_inter, and_assoc]
theorem filter_inter (s t : Finset α) : filter p s ∩ t = filter p (s ∩ t) := by
ext
simp only [mem_inter, mem_filter, and_right_comm]
theorem inter_filter (s t : Finset α) : s ∩ filter p t = filter p (s ∩ t) := by
rw [inter_comm, filter_inter, inter_comm]
theorem filter_insert (a : α) (s : Finset α) :
filter p (insert a s) = if p a then insert a (filter p s) else filter p s := by
ext x
split_ifs with h <;> by_cases h' : x = a <;> simp [h, h']
theorem filter_erase (a : α) (s : Finset α) : filter p (erase s a) = erase (filter p s) a := by
ext x
simp only [and_assoc, mem_filter, iff_self, mem_erase]
theorem filter_or (s : Finset α) : (s.filter fun a => p a ∨ q a) = s.filter p ∪ s.filter q :=
ext fun _ => by simp [mem_filter, mem_union, and_or_left]
theorem filter_and (s : Finset α) : (s.filter fun a => p a ∧ q a) = s.filter p ∩ s.filter q :=
ext fun _ => by simp [mem_filter, mem_inter, and_comm, and_left_comm, and_self_iff, and_assoc]
theorem filter_not (s : Finset α) : (s.filter fun a => ¬p a) = s \ s.filter p :=
ext fun a => by
simp only [Bool.decide_coe, Bool.not_eq_true', mem_filter, and_comm, mem_sdiff, not_and_or,
Bool.not_eq_true, and_or_left, and_not_self, or_false]
lemma filter_and_not (s : Finset α) (p q : α → Prop) [DecidablePred p] [DecidablePred q] :
s.filter (fun a ↦ p a ∧ ¬ q a) = s.filter p \ s.filter q := by
rw [filter_and, filter_not, ← inter_sdiff_assoc, inter_eq_left.2 (filter_subset _ _)]
theorem sdiff_eq_filter (s₁ s₂ : Finset α) : s₁ \ s₂ = filter (· ∉ s₂) s₁ :=
ext fun _ => by simp [mem_sdiff, mem_filter]
theorem subset_union_elim {s : Finset α} {t₁ t₂ : Set α} (h : ↑s ⊆ t₁ ∪ t₂) :
∃ s₁ s₂ : Finset α, s₁ ∪ s₂ = s ∧ ↑s₁ ⊆ t₁ ∧ ↑s₂ ⊆ t₂ \ t₁ := by
classical
refine ⟨s.filter (· ∈ t₁), s.filter (· ∉ t₁), ?_, ?_, ?_⟩
· simp [filter_union_right, em]
· intro x
simp
· intro x
simp only [not_not, coe_filter, Set.mem_setOf_eq, Set.mem_diff, and_imp]
intro hx hx₂
exact ⟨Or.resolve_left (h hx) hx₂, hx₂⟩
-- This is not a good simp lemma, as it would prevent `Finset.mem_filter` from firing
-- on, e.g. `x ∈ s.filter (Eq b)`.
/-- After filtering out everything that does not equal a given value, at most that value remains.
This is equivalent to `filter_eq'` with the equality the other way.
-/
theorem filter_eq [DecidableEq β] (s : Finset β) (b : β) :
s.filter (Eq b) = ite (b ∈ s) {b} ∅ := by
split_ifs with h
· ext
simp only [mem_filter, mem_singleton, decide_eq_true_eq]
refine ⟨fun h => h.2.symm, ?_⟩
rintro rfl
exact ⟨h, rfl⟩
· ext
simp only [mem_filter, not_and, iff_false, not_mem_empty, decide_eq_true_eq]
rintro m rfl
exact h m
/-- After filtering out everything that does not equal a given value, at most that value remains.
This is equivalent to `filter_eq` with the equality the other way.
-/
theorem filter_eq' [DecidableEq β] (s : Finset β) (b : β) :
(s.filter fun a => a = b) = ite (b ∈ s) {b} ∅ :=
_root_.trans (filter_congr fun _ _ => by simp_rw [@eq_comm _ b]) (filter_eq s b)
theorem filter_ne [DecidableEq β] (s : Finset β) (b : β) :
(s.filter fun a => b ≠ a) = s.erase b := by
ext
simp only [mem_filter, mem_erase, Ne, decide_not, Bool.not_eq_true', decide_eq_false_iff_not]
tauto
theorem filter_ne' [DecidableEq β] (s : Finset β) (b : β) : (s.filter fun a => a ≠ b) = s.erase b :=
_root_.trans (filter_congr fun _ _ => by simp_rw [@ne_comm _ b]) (filter_ne s b)
theorem filter_union_filter_of_codisjoint (s : Finset α) (h : Codisjoint p q) :
s.filter p ∪ s.filter q = s :=
(filter_or _ _ _).symm.trans <| filter_true_of_mem fun x _ => h.top_le x trivial
theorem filter_union_filter_neg_eq [∀ x, Decidable (¬p x)] (s : Finset α) :
(s.filter p ∪ s.filter fun a => ¬p a) = s :=
filter_union_filter_of_codisjoint _ _ _ <| @codisjoint_hnot_right _ _ p
end
end Filter
/-! ### range -/
section Range
open Nat
variable {n m l : ℕ}
@[simp]
theorem range_filter_eq {n m : ℕ} : (range n).filter (· = m) = if m < n then {m} else ∅ := by
convert filter_eq (range n) m using 2
· ext
rw [eq_comm]
· simp
end Range
end Finset
/-! ### dedup on list and multiset -/
namespace Multiset
variable [DecidableEq α] {s t : Multiset α}
@[simp]
theorem toFinset_add (s t : Multiset α) : toFinset (s + t) = toFinset s ∪ toFinset t :=
Finset.ext <| by simp
@[simp]
theorem toFinset_inter (s t : Multiset α) : toFinset (s ∩ t) = toFinset s ∩ toFinset t :=
Finset.ext <| by simp
@[simp]
theorem toFinset_union (s t : Multiset α) : (s ∪ t).toFinset = s.toFinset ∪ t.toFinset := by
ext; simp
@[simp]
theorem toFinset_eq_empty {m : Multiset α} : m.toFinset = ∅ ↔ m = 0 :=
Finset.val_inj.symm.trans Multiset.dedup_eq_zero
@[simp]
theorem toFinset_nonempty : s.toFinset.Nonempty ↔ s ≠ 0 := by
simp only [toFinset_eq_empty, Ne, Finset.nonempty_iff_ne_empty]
@[aesop safe apply (rule_sets := [finsetNonempty])]
protected alias ⟨_, Aesop.toFinset_nonempty_of_ne⟩ := toFinset_nonempty
@[simp]
theorem toFinset_filter (s : Multiset α) (p : α → Prop) [DecidablePred p] :
Multiset.toFinset (s.filter p) = s.toFinset.filter p := by
ext; simp
end Multiset
namespace List
variable [DecidableEq α] {l l' : List α} {a : α} {f : α → β}
{s : Finset α} {t : Set β} {t' : Finset β}
@[simp]
theorem toFinset_union (l l' : List α) : (l ∪ l').toFinset = l.toFinset ∪ l'.toFinset := by
ext
simp
@[simp]
theorem toFinset_inter (l l' : List α) : (l ∩ l').toFinset = l.toFinset ∩ l'.toFinset := by
ext
simp
@[aesop safe apply (rule_sets := [finsetNonempty])]
alias ⟨_, Aesop.toFinset_nonempty_of_ne⟩ := toFinset_nonempty_iff
@[simp]
theorem toFinset_filter (s : List α) (p : α → Bool) :
(s.filter p).toFinset = s.toFinset.filter (p ·) := by
ext; simp [List.mem_filter]
end List
namespace Finset
section ToList
@[simp]
theorem toList_eq_nil {s : Finset α} : s.toList = [] ↔ s = ∅ :=
Multiset.toList_eq_nil.trans val_eq_zero
theorem empty_toList {s : Finset α} : s.toList.isEmpty ↔ s = ∅ := by simp
@[simp]
theorem toList_empty : (∅ : Finset α).toList = [] :=
toList_eq_nil.mpr rfl
theorem Nonempty.toList_ne_nil {s : Finset α} (hs : s.Nonempty) : s.toList ≠ [] :=
mt toList_eq_nil.mp hs.ne_empty
theorem Nonempty.not_empty_toList {s : Finset α} (hs : s.Nonempty) : ¬s.toList.isEmpty :=
mt empty_toList.mp hs.ne_empty
end ToList
/-! ### choose -/
section Choose
variable (p : α → Prop) [DecidablePred p] (l : Finset α)
/-- Given a finset `l` and a predicate `p`, associate to a proof that there is a unique element of
`l` satisfying `p` this unique element, as an element of the corresponding subtype. -/
def chooseX (hp : ∃! a, a ∈ l ∧ p a) : { a // a ∈ l ∧ p a } :=
Multiset.chooseX p l.val hp
/-- Given a finset `l` and a predicate `p`, associate to a proof that there is a unique element of
`l` satisfying `p` this unique element, as an element of the ambient type. -/
def choose (hp : ∃! a, a ∈ l ∧ p a) : α :=
chooseX p l hp
theorem choose_spec (hp : ∃! a, a ∈ l ∧ p a) : choose p l hp ∈ l ∧ p (choose p l hp) :=
(chooseX p l hp).property
theorem choose_mem (hp : ∃! a, a ∈ l ∧ p a) : choose p l hp ∈ l :=
(choose_spec _ _ _).1
theorem choose_property (hp : ∃! a, a ∈ l ∧ p a) : p (choose p l hp) :=
(choose_spec _ _ _).2
end Choose
end Finset
namespace Equiv
variable [DecidableEq α] {s t : Finset α}
open Finset
/-- The disjoint union of finsets is a sum -/
def Finset.union (s t : Finset α) (h : Disjoint s t) :
s ⊕ t ≃ (s ∪ t : Finset α) :=
Equiv.setCongr (coe_union _ _) |>.trans (Equiv.Set.union (disjoint_coe.mpr h)) |>.symm
@[simp]
theorem Finset.union_symm_inl (h : Disjoint s t) (x : s) :
Equiv.Finset.union s t h (Sum.inl x) = ⟨x, Finset.mem_union.mpr <| Or.inl x.2⟩ :=
rfl
@[simp]
theorem Finset.union_symm_inr (h : Disjoint s t) (y : t) :
Equiv.Finset.union s t h (Sum.inr y) = ⟨y, Finset.mem_union.mpr <| Or.inr y.2⟩ :=
rfl
/-- The type of dependent functions on the disjoint union of finsets `s ∪ t` is equivalent to the
type of pairs of functions on `s` and on `t`. This is similar to `Equiv.sumPiEquivProdPi`. -/
def piFinsetUnion {ι} [DecidableEq ι] (α : ι → Type*) {s t : Finset ι} (h : Disjoint s t) :
((∀ i : s, α i) × ∀ i : t, α i) ≃ ∀ i : (s ∪ t : Finset ι), α i :=
let e := Equiv.Finset.union s t h
sumPiEquivProdPi (fun b ↦ α (e b)) |>.symm.trans (.piCongrLeft (fun i : ↥(s ∪ t) ↦ α i) e)
/-- A finset is equivalent to its coercion as a set. -/
def _root_.Finset.equivToSet (s : Finset α) : s ≃ s.toSet where
toFun a := ⟨a.1, mem_coe.2 a.2⟩
invFun a := ⟨a.1, mem_coe.1 a.2⟩
left_inv := fun _ ↦ rfl
right_inv := fun _ ↦ rfl
end Equiv
namespace Multiset
variable [DecidableEq α]
@[simp]
lemma toFinset_replicate (n : ℕ) (a : α) :
(replicate n a).toFinset = if n = 0 then ∅ else {a} := by
ext x
simp only [mem_toFinset, Finset.mem_singleton, mem_replicate]
split_ifs with hn <;> simp [hn]
end Multiset
| Mathlib/Data/Finset/Basic.lean | 2,900 | 2,902 | |
/-
Copyright (c) 2022 Andrew Yang. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Andrew Yang
-/
import Mathlib.LinearAlgebra.Matrix.Charpoly.Coeff
import Mathlib.LinearAlgebra.Matrix.ToLin
/-!
# Cayley-Hamilton theorem for f.g. modules.
Given a fixed finite spanning set `b : ι → M` of an `R`-module `M`, we say that a matrix `M`
represents an endomorphism `f : M →ₗ[R] M` if the matrix as an endomorphism of `ι → R` commutes
with `f` via the projection `(ι → R) →ₗ[R] M` given by `b`.
We show that every endomorphism has a matrix representation, and if `f.range ≤ I • ⊤` for some
ideal `I`, we may furthermore obtain a matrix representation whose entries fall in `I`.
This is used to conclude the Cayley-Hamilton theorem for f.g. modules over arbitrary rings.
-/
variable {ι : Type*} [Fintype ι]
variable {M : Type*} [AddCommGroup M] (R : Type*) [CommRing R] [Module R M] (I : Ideal R)
variable (b : ι → M)
open Polynomial Matrix
/-- The composition of a matrix (as an endomorphism of `ι → R`) with the projection
`(ι → R) →ₗ[R] M`. -/
def PiToModule.fromMatrix [DecidableEq ι] : Matrix ι ι R →ₗ[R] (ι → R) →ₗ[R] M :=
(LinearMap.llcomp R _ _ _ (Fintype.linearCombination R b)).comp algEquivMatrix'.symm.toLinearMap
theorem PiToModule.fromMatrix_apply [DecidableEq ι] (A : Matrix ι ι R) (w : ι → R) :
PiToModule.fromMatrix R b A w = Fintype.linearCombination R b (A *ᵥ w) :=
rfl
theorem PiToModule.fromMatrix_apply_single_one [DecidableEq ι] (A : Matrix ι ι R) (j : ι) :
PiToModule.fromMatrix R b A (Pi.single j 1) = ∑ i : ι, A i j • b i := by
rw [PiToModule.fromMatrix_apply, Fintype.linearCombination_apply, Matrix.mulVec_single]
simp_rw [MulOpposite.op_one, one_smul, transpose_apply]
/-- The endomorphisms of `M` acts on `(ι → R) →ₗ[R] M`, and takes the projection
to a `(ι → R) →ₗ[R] M`. -/
def PiToModule.fromEnd : Module.End R M →ₗ[R] (ι → R) →ₗ[R] M :=
LinearMap.lcomp _ _ (Fintype.linearCombination R b)
theorem PiToModule.fromEnd_apply (f : Module.End R M) (w : ι → R) :
PiToModule.fromEnd R b f w = f (Fintype.linearCombination R b w) :=
rfl
theorem PiToModule.fromEnd_apply_single_one [DecidableEq ι] (f : Module.End R M) (i : ι) :
PiToModule.fromEnd R b f (Pi.single i 1) = f (b i) := by
rw [PiToModule.fromEnd_apply, Fintype.linearCombination_apply_single, one_smul]
theorem PiToModule.fromEnd_injective (hb : Submodule.span R (Set.range b) = ⊤) :
Function.Injective (PiToModule.fromEnd R b) := by
intro x y e
ext m
obtain ⟨m, rfl⟩ : m ∈ LinearMap.range (Fintype.linearCombination R b) := by
rw [(Fintype.range_linearCombination R b).trans hb]
exact Submodule.mem_top
exact (LinearMap.congr_fun e m :)
section
| variable {R} [DecidableEq ι]
/-- We say that a matrix represents an endomorphism of `M` if the matrix acting on `ι → R` is
equal to `f` via the projection `(ι → R) →ₗ[R] M` given by a fixed (spanning) set. -/
def Matrix.Represents (A : Matrix ι ι R) (f : Module.End R M) : Prop :=
PiToModule.fromMatrix R b A = PiToModule.fromEnd R b f
variable {b}
| Mathlib/LinearAlgebra/Matrix/Charpoly/LinearMap.lean | 68 | 75 |
/-
Copyright (c) 2023 Yaël Dillies, Bhavik Mehta. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Yaël Dillies, Bhavik Mehta
-/
import Mathlib.Combinatorics.SimpleGraph.Triangle.Basic
/-!
# Construct a tripartite graph from its triangles
This file contains the construction of a simple graph on `α ⊕ β ⊕ γ` from a list of triangles
`(a, b, c)` (with `a` in the first component, `b` in the second, `c` in the third).
We call
* `t : Finset (α × β × γ)` the set of *triangle indices* (its elements are not triangles within the
graph but instead index them).
* *explicit* a triangle of the constructed graph coming from a triangle index.
* *accidental* a triangle of the constructed graph not coming from a triangle index.
The two important properties of this construction are:
* `SimpleGraph.TripartiteFromTriangles.ExplicitDisjoint`: Whether the explicit triangles are
edge-disjoint.
* `SimpleGraph.TripartiteFromTriangles.NoAccidental`: Whether all triangles are explicit.
This construction shows up unrelatedly twice in the theory of Roth numbers:
* The lower bound of the Ruzsa-Szemerédi problem: From a set `s` in a finite abelian group `G` of
odd order, we construct a tripartite graph on `G ⊕ G ⊕ G`. The triangle indices are
`(x, x + a, x + 2 * a)` for `x` any element and `a ∈ s`. The explicit triangles are always
edge-disjoint and there is no accidental triangle if `s` is 3AP-free.
* The proof of the corners theorem from the triangle removal lemma: For a set `s` in a finite
abelian group `G`, we construct a tripartite graph on `G ⊕ G ⊕ G`, whose vertices correspond to
the horizontal, vertical and diagonal lines in `G × G`. The explicit triangles are `(h, v, d)`
where `h`, `v`, `d` are horizontal, vertical, diagonal lines that intersect in an element of `s`.
The explicit triangles are always edge-disjoint and there is no accidental triangle if `s` is
corner-free.
-/
open Finset Function Sum3
variable {α β γ 𝕜 : Type*} [Field 𝕜] [LinearOrder 𝕜] [IsStrictOrderedRing 𝕜]
{t : Finset (α × β × γ)} {a a' : α} {b b' : β} {c c' : γ} {x : α × β × γ}
namespace SimpleGraph
namespace TripartiteFromTriangles
/-- The underlying relation of the tripartite-from-triangles graph.
Two vertices are related iff there exists a triangle index containing them both. -/
@[mk_iff] inductive Rel (t : Finset (α × β × γ)) : α ⊕ β ⊕ γ → α ⊕ β ⊕ γ → Prop
| in₀₁ ⦃a b c⦄ : (a, b, c) ∈ t → Rel t (in₀ a) (in₁ b)
| in₁₀ ⦃a b c⦄ : (a, b, c) ∈ t → Rel t (in₁ b) (in₀ a)
| in₀₂ ⦃a b c⦄ : (a, b, c) ∈ t → Rel t (in₀ a) (in₂ c)
| in₂₀ ⦃a b c⦄ : (a, b, c) ∈ t → Rel t (in₂ c) (in₀ a)
| in₁₂ ⦃a b c⦄ : (a, b, c) ∈ t → Rel t (in₁ b) (in₂ c)
| in₂₁ ⦃a b c⦄ : (a, b, c) ∈ t → Rel t (in₂ c) (in₁ b)
open Rel
lemma rel_irrefl : ∀ x, ¬ Rel t x x := fun _x hx ↦ nomatch hx
lemma rel_symm : Symmetric (Rel t) := fun x y h ↦ by cases h <;> constructor <;> assumption
/-- The tripartite-from-triangles graph. Two vertices are related iff there exists a triangle index
containing them both. -/
def graph (t : Finset (α × β × γ)) : SimpleGraph (α ⊕ β ⊕ γ) := ⟨Rel t, rel_symm, rel_irrefl⟩
namespace Graph
@[simp] lemma not_in₀₀ : ¬ (graph t).Adj (in₀ a) (in₀ a') := fun h ↦ nomatch h
@[simp] lemma not_in₁₁ : ¬ (graph t).Adj (in₁ b) (in₁ b') := fun h ↦ nomatch h
@[simp] lemma not_in₂₂ : ¬ (graph t).Adj (in₂ c) (in₂ c') := fun h ↦ nomatch h
@[simp] lemma in₀₁_iff : (graph t).Adj (in₀ a) (in₁ b) ↔ ∃ c, (a, b, c) ∈ t :=
⟨by rintro ⟨⟩; exact ⟨_, ‹_›⟩, fun ⟨_, h⟩ ↦ in₀₁ h⟩
@[simp] lemma in₁₀_iff : (graph t).Adj (in₁ b) (in₀ a) ↔ ∃ c, (a, b, c) ∈ t :=
⟨by rintro ⟨⟩; exact ⟨_, ‹_›⟩, fun ⟨_, h⟩ ↦ in₁₀ h⟩
@[simp] lemma in₀₂_iff : (graph t).Adj (in₀ a) (in₂ c) ↔ ∃ b, (a, b, c) ∈ t :=
⟨by rintro ⟨⟩; exact ⟨_, ‹_›⟩, fun ⟨_, h⟩ ↦ in₀₂ h⟩
@[simp] lemma in₂₀_iff : (graph t).Adj (in₂ c) (in₀ a) ↔ ∃ b, (a, b, c) ∈ t :=
⟨by rintro ⟨⟩; exact ⟨_, ‹_›⟩, fun ⟨_, h⟩ ↦ in₂₀ h⟩
@[simp] lemma in₁₂_iff : (graph t).Adj (in₁ b) (in₂ c) ↔ ∃ a, (a, b, c) ∈ t :=
⟨by rintro ⟨⟩; exact ⟨_, ‹_›⟩, fun ⟨_, h⟩ ↦ in₁₂ h⟩
@[simp] lemma in₂₁_iff : (graph t).Adj (in₂ c) (in₁ b) ↔ ∃ a, (a, b, c) ∈ t :=
⟨by rintro ⟨⟩; exact ⟨_, ‹_›⟩, fun ⟨_, h⟩ ↦ in₂₁ h⟩
lemma in₀₁_iff' :
(graph t).Adj (in₀ a) (in₁ b) ↔ ∃ x : α × β × γ, x ∈ t ∧ x.1 = a ∧ x.2.1 = b where
mp := by rintro ⟨⟩; exact ⟨_, ‹_›, by simp⟩
mpr := by rintro ⟨⟨a, b, c⟩, h, rfl, rfl⟩; constructor; assumption
lemma in₁₀_iff' :
(graph t).Adj (in₁ b) (in₀ a) ↔ ∃ x : α × β × γ, x ∈ t ∧ x.2.1 = b ∧ x.1 = a where
mp := by rintro ⟨⟩; exact ⟨_, ‹_›, by simp⟩
mpr := by rintro ⟨⟨a, b, c⟩, h, rfl, rfl⟩; constructor; assumption
lemma in₀₂_iff' :
(graph t).Adj (in₀ a) (in₂ c) ↔ ∃ x : α × β × γ, x ∈ t ∧ x.1 = a ∧ x.2.2 = c where
mp := by rintro ⟨⟩; exact ⟨_, ‹_›, by simp⟩
mpr := by rintro ⟨⟨a, b, c⟩, h, rfl, rfl⟩; constructor; assumption
lemma in₂₀_iff' :
(graph t).Adj (in₂ c) (in₀ a) ↔ ∃ x : α × β × γ, x ∈ t ∧ x.2.2 = c ∧ x.1 = a where
mp := by rintro ⟨⟩; exact ⟨_, ‹_›, by simp⟩
mpr := by rintro ⟨⟨a, b, c⟩, h, rfl, rfl⟩; constructor; assumption
lemma in₁₂_iff' :
(graph t).Adj (in₁ b) (in₂ c) ↔ ∃ x : α × β × γ, x ∈ t ∧ x.2.1 = b ∧ x.2.2 = c where
mp := by rintro ⟨⟩; exact ⟨_, ‹_›, by simp⟩
mpr := by rintro ⟨⟨a, b, c⟩, h, rfl, rfl⟩; constructor; assumption
lemma in₂₁_iff' :
(graph t).Adj (in₂ c) (in₁ b) ↔ ∃ x : α × β × γ, x ∈ t ∧ x.2.2 = c ∧ x.2.1 = b where
mp := by rintro ⟨⟩; exact ⟨_, ‹_›, by simp⟩
mpr := by rintro ⟨⟨a, b, c⟩, h, rfl, rfl⟩; constructor; assumption
end Graph
open Graph
/-- Predicate on the triangle indices for the explicit triangles to be edge-disjoint. -/
class ExplicitDisjoint (t : Finset (α × β × γ)) : Prop where
inj₀ : ∀ ⦃a b c a'⦄, (a, b, c) ∈ t → (a', b, c) ∈ t → a = a'
inj₁ : ∀ ⦃a b c b'⦄, (a, b, c) ∈ t → (a, b', c) ∈ t → b = b'
inj₂ : ∀ ⦃a b c c'⦄, (a, b, c) ∈ t → (a, b, c') ∈ t → c = c'
/-- Predicate on the triangle indices for there to be no accidental triangle.
Note that we cheat a bit, since the exact translation of this informal description would have
`(a', b', c') ∈ t` as a conclusion rather than `a = a' ∨ b = b' ∨ c = c'`. Those conditions are
equivalent when the explicit triangles are edge-disjoint (which is the case we care about). -/
class NoAccidental (t : Finset (α × β × γ)) : Prop where
eq_or_eq_or_eq : ∀ ⦃a a' b b' c c'⦄, (a', b, c) ∈ t → (a, b', c) ∈ t → (a, b, c') ∈ t →
a = a' ∨ b = b' ∨ c = c'
section DecidableEq
variable [DecidableEq α] [DecidableEq β] [DecidableEq γ]
instance graph.instDecidableRelAdj : DecidableRel (graph t).Adj
| in₀ _a, in₀ _a' => Decidable.isFalse not_in₀₀
| in₀ _a, in₁ _b' => decidable_of_iff' _ in₀₁_iff'
| in₀ _a, in₂ _c' => decidable_of_iff' _ in₀₂_iff'
| in₁ _b, in₀ _a' => decidable_of_iff' _ in₁₀_iff'
| in₁ _b, in₁ _b' => Decidable.isFalse not_in₁₁
| in₁ _b, in₂ _b' => decidable_of_iff' _ in₁₂_iff'
| in₂ _c, in₀ _a' => decidable_of_iff' _ in₂₀_iff'
| in₂ _c, in₁ _b' => decidable_of_iff' _ in₂₁_iff'
| in₂ _c, in₂ _b' => Decidable.isFalse not_in₂₂
/-- This lemma reorders the elements of a triangle in the tripartite graph. It turns a triangle
`{x, y, z}` into a triangle `{a, b, c}` where `a : α `, `b : β`, `c : γ`. -/
lemma graph_triple ⦃x y z⦄ :
(graph t).Adj x y → (graph t).Adj x z → (graph t).Adj y z → ∃ a b c,
({in₀ a, in₁ b, in₂ c} : Finset (α ⊕ β ⊕ γ)) = {x, y, z} ∧ (graph t).Adj (in₀ a) (in₁ b) ∧
(graph t).Adj (in₀ a) (in₂ c) ∧ (graph t).Adj (in₁ b) (in₂ c) := by
rintro (_ | _ | _) (_ | _ | _) (_ | _ | _) <;>
refine ⟨_, _, _, by ext; simp only [Finset.mem_insert, Finset.mem_singleton]; try tauto,
?_, ?_, ?_⟩ <;> constructor <;> assumption
/-- The map that turns a triangle index into an explicit triangle. -/
@[simps] def toTriangle : α × β × γ ↪ Finset (α ⊕ β ⊕ γ) where
toFun x := {in₀ x.1, in₁ x.2.1, in₂ x.2.2}
inj' := fun ⟨a, b, c⟩ ⟨a', b', c'⟩ ↦ by simpa only [Finset.Subset.antisymm_iff, Finset.subset_iff,
mem_insert, mem_singleton, forall_eq_or_imp, forall_eq, Prod.mk_inj, or_false, false_or,
in₀, in₁, in₂, Sum.inl.inj_iff, Sum.inr.inj_iff, reduceCtorEq] using And.left
lemma toTriangle_is3Clique (hx : x ∈ t) : (graph t).IsNClique 3 (toTriangle x) := by
simp only [toTriangle_apply, is3Clique_triple_iff, in₀₁_iff, in₀₂_iff, in₁₂_iff]
exact ⟨⟨_, hx⟩, ⟨_, hx⟩, _, hx⟩
lemma exists_mem_toTriangle {x y : α ⊕ β ⊕ γ} (hxy : (graph t).Adj x y) :
∃ z ∈ t, x ∈ toTriangle z ∧ y ∈ toTriangle z := by cases hxy <;> exact ⟨_, ‹_›, by simp⟩
nonrec lemma is3Clique_iff [NoAccidental t] {s : Finset (α ⊕ β ⊕ γ)} :
(graph t).IsNClique 3 s ↔ ∃ x, x ∈ t ∧ toTriangle x = s := by
refine ⟨fun h ↦ ?_, ?_⟩
· rw [is3Clique_iff] at h
obtain ⟨x, y, z, hxy, hxz, hyz, rfl⟩ := h
obtain ⟨a, b, c, habc, hab, hac, hbc⟩ := graph_triple hxy hxz hyz
refine ⟨(a, b, c), ?_, habc⟩
obtain ⟨c', hc'⟩ := in₀₁_iff.1 hab
obtain ⟨b', hb'⟩ := in₀₂_iff.1 hac
obtain ⟨a', ha'⟩ := in₁₂_iff.1 hbc
obtain rfl | rfl | rfl := NoAccidental.eq_or_eq_or_eq ha' hb' hc' <;> assumption
· rintro ⟨x, hx, rfl⟩
exact toTriangle_is3Clique hx
lemma toTriangle_surjOn [NoAccidental t] :
(t : Set (α × β × γ)).SurjOn toTriangle ((graph t).cliqueSet 3) := fun _ ↦ is3Clique_iff.1
variable (t)
lemma map_toTriangle_disjoint [ExplicitDisjoint t] :
(t.map toTriangle : Set (Finset (α ⊕ β ⊕ γ))).Pairwise
fun x y ↦ (x ∩ y : Set (α ⊕ β ⊕ γ)).Subsingleton := by
intro
simp only [Finset.coe_map, Set.mem_image, Finset.mem_coe, Prod.exists, Ne,
forall_exists_index, and_imp]
rintro a b c habc rfl e x y z hxyz rfl h'
have := ne_of_apply_ne _ h'
simp only [Ne, Prod.mk_inj, not_and] at this
simp only [toTriangle_apply, in₀, in₁, in₂, Set.mem_inter_iff, mem_insert, mem_singleton,
mem_coe, and_imp, Sum.forall, or_false, forall_eq, false_or, eq_self_iff_true, imp_true_iff,
true_and, and_true, Set.Subsingleton]
suffices ¬ (a = x ∧ b = y) ∧ ¬ (a = x ∧ c = z) ∧ ¬ (b = y ∧ c = z) by aesop
refine ⟨?_, ?_, ?_⟩
· rintro ⟨rfl, rfl⟩
exact this rfl rfl (ExplicitDisjoint.inj₂ habc hxyz)
· rintro ⟨rfl, rfl⟩
exact this rfl (ExplicitDisjoint.inj₁ habc hxyz) rfl
· rintro ⟨rfl, rfl⟩
exact this (ExplicitDisjoint.inj₀ habc hxyz) rfl rfl
lemma cliqueSet_eq_image [NoAccidental t] : (graph t).cliqueSet 3 = toTriangle '' t := by
ext; exact is3Clique_iff
section Fintype
variable [Fintype α] [Fintype β] [Fintype γ]
lemma cliqueFinset_eq_image [NoAccidental t] : (graph t).cliqueFinset 3 = t.image toTriangle :=
coe_injective <| by push_cast; exact cliqueSet_eq_image _
lemma cliqueFinset_eq_map [NoAccidental t] : (graph t).cliqueFinset 3 = t.map toTriangle := by
simp [cliqueFinset_eq_image, map_eq_image]
@[simp] lemma card_triangles [NoAccidental t] : #((graph t).cliqueFinset 3) = #t := by
rw [cliqueFinset_eq_map, card_map]
lemma farFromTriangleFree [ExplicitDisjoint t] {ε : 𝕜}
| (ht : ε * ((Fintype.card α + Fintype.card β + Fintype.card γ) ^ 2 : ℕ) ≤ #t) :
(graph t).FarFromTriangleFree ε :=
farFromTriangleFree_of_disjoint_triangles (t.map toTriangle)
(map_subset_iff_subset_preimage.2 fun x hx ↦ by simpa using toTriangle_is3Clique hx)
(map_toTriangle_disjoint t) <| by simpa [add_assoc] using ht
| Mathlib/Combinatorics/SimpleGraph/Triangle/Tripartite.lean | 223 | 228 |
/-
Copyright (c) 2018 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes
-/
import Mathlib.Data.Nat.ModEq
/-!
# Congruences modulo an integer
This file defines the equivalence relation `a ≡ b [ZMOD n]` on the integers, similarly to how
`Data.Nat.ModEq` defines them for the natural numbers. The notation is short for `n.ModEq a b`,
which is defined to be `a % n = b % n` for integers `a b n`.
## Tags
modeq, congruence, mod, MOD, modulo, integers
-/
namespace Int
/-- `a ≡ b [ZMOD n]` when `a % n = b % n`. -/
def ModEq (n a b : ℤ) :=
a % n = b % n
@[inherit_doc]
notation:50 a " ≡ " b " [ZMOD " n "]" => ModEq n a b
variable {m n a b c d : ℤ}
instance : Decidable (ModEq n a b) := decEq (a % n) (b % n)
namespace ModEq
@[refl, simp]
protected theorem refl (a : ℤ) : a ≡ a [ZMOD n] :=
@rfl _ _
protected theorem rfl : a ≡ a [ZMOD n] :=
ModEq.refl _
instance : IsRefl _ (ModEq n) :=
⟨ModEq.refl⟩
@[symm]
protected theorem symm : a ≡ b [ZMOD n] → b ≡ a [ZMOD n] :=
Eq.symm
@[trans]
protected theorem trans : a ≡ b [ZMOD n] → b ≡ c [ZMOD n] → a ≡ c [ZMOD n] :=
Eq.trans
instance : IsTrans ℤ (ModEq n) where
trans := @Int.ModEq.trans n
protected theorem eq : a ≡ b [ZMOD n] → a % n = b % n := id
end ModEq
theorem modEq_comm : a ≡ b [ZMOD n] ↔ b ≡ a [ZMOD n] := ⟨ModEq.symm, ModEq.symm⟩
theorem natCast_modEq_iff {a b n : ℕ} : a ≡ b [ZMOD n] ↔ a ≡ b [MOD n] := by
unfold ModEq Nat.ModEq; rw [← Int.ofNat_inj]; simp [natCast_mod]
theorem modEq_zero_iff_dvd : a ≡ 0 [ZMOD n] ↔ n ∣ a := by
rw [ModEq, zero_emod, dvd_iff_emod_eq_zero]
theorem _root_.Dvd.dvd.modEq_zero_int (h : n ∣ a) : a ≡ 0 [ZMOD n] :=
modEq_zero_iff_dvd.2 h
theorem _root_.Dvd.dvd.zero_modEq_int (h : n ∣ a) : 0 ≡ a [ZMOD n] :=
h.modEq_zero_int.symm
theorem modEq_iff_dvd : a ≡ b [ZMOD n] ↔ n ∣ b - a := by
rw [ModEq, eq_comm]
simp [emod_eq_emod_iff_emod_sub_eq_zero, dvd_iff_emod_eq_zero]
theorem modEq_iff_add_fac {a b n : ℤ} : a ≡ b [ZMOD n] ↔ ∃ t, b = a + n * t := by
rw [modEq_iff_dvd]
exact exists_congr fun t => sub_eq_iff_eq_add'
alias ⟨ModEq.dvd, modEq_of_dvd⟩ := modEq_iff_dvd
theorem mod_modEq (a n) : a % n ≡ a [ZMOD n] :=
emod_emod _ _
@[simp]
theorem neg_modEq_neg : -a ≡ -b [ZMOD n] ↔ a ≡ b [ZMOD n] := by
simp only [modEq_iff_dvd, (by omega : -b - -a = -(b - a)), Int.dvd_neg]
@[simp]
theorem modEq_neg : a ≡ b [ZMOD -n] ↔ a ≡ b [ZMOD n] := by simp [modEq_iff_dvd]
namespace ModEq
protected theorem of_dvd (d : m ∣ n) (h : a ≡ b [ZMOD n]) : a ≡ b [ZMOD m] :=
modEq_iff_dvd.2 <| d.trans h.dvd
protected theorem mul_left' (h : a ≡ b [ZMOD n]) : c * a ≡ c * b [ZMOD c * n] := by
obtain hc | rfl | hc := lt_trichotomy c 0
· rw [← neg_modEq_neg, ← modEq_neg, ← Int.neg_mul, ← Int.neg_mul, ← Int.neg_mul]
simp only [ModEq, mul_emod_mul_of_pos _ _ (neg_pos.2 hc), h.eq]
· simp only [Int.zero_mul, ModEq.rfl]
· simp only [ModEq, mul_emod_mul_of_pos _ _ hc, h.eq]
protected theorem mul_right' (h : a ≡ b [ZMOD n]) : a * c ≡ b * c [ZMOD n * c] := by
rw [mul_comm a, mul_comm b, mul_comm n]; exact h.mul_left'
@[gcongr]
protected theorem add (h₁ : a ≡ b [ZMOD n]) (h₂ : c ≡ d [ZMOD n]) : a + c ≡ b + d [ZMOD n] :=
modEq_iff_dvd.2 <| by convert Int.dvd_add h₁.dvd h₂.dvd using 1; omega
@[gcongr] protected theorem add_left (c : ℤ) (h : a ≡ b [ZMOD n]) : c + a ≡ c + b [ZMOD n] :=
ModEq.rfl.add h
| Mathlib/Data/Int/ModEq.lean | 118 | 118 | |
/-
Copyright (c) 2018 Andreas Swerdlow. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Andreas Swerdlow, Kexing Ying
-/
import Mathlib.Algebra.GroupWithZero.NonZeroDivisors
import Mathlib.LinearAlgebra.BilinearForm.Properties
/-!
# Bilinear form
This file defines orthogonal bilinear forms.
## Notations
Given any term `B` of type `BilinForm`, due to a coercion, can use
the notation `B x y` to refer to the function field, ie. `B x y = B.bilin x y`.
In this file we use the following type variables:
- `M`, `M'`, ... are modules over the commutative semiring `R`,
- `M₁`, `M₁'`, ... are modules over the commutative ring `R₁`,
- `V`, ... is a vector space over the field `K`.
## References
* <https://en.wikipedia.org/wiki/Bilinear_form>
## Tags
Bilinear form,
-/
open LinearMap (BilinForm)
universe u v w
variable {R : Type*} {M : Type*} [CommSemiring R] [AddCommMonoid M] [Module R M]
variable {R₁ : Type*} {M₁ : Type*} [CommRing R₁] [AddCommGroup M₁] [Module R₁ M₁]
variable {V : Type*} {K : Type*} [Field K] [AddCommGroup V] [Module K V]
variable {B : BilinForm R M} {B₁ : BilinForm R₁ M₁}
namespace LinearMap
namespace BilinForm
/-- The proposition that two elements of a bilinear form space are orthogonal. For orthogonality
of an indexed set of elements, use `BilinForm.iIsOrtho`. -/
def IsOrtho (B : BilinForm R M) (x y : M) : Prop :=
B x y = 0
theorem isOrtho_def {B : BilinForm R M} {x y : M} : B.IsOrtho x y ↔ B x y = 0 :=
Iff.rfl
theorem isOrtho_zero_left (x : M) : IsOrtho B (0 : M) x := LinearMap.isOrtho_zero_left B x
theorem isOrtho_zero_right (x : M) : IsOrtho B x (0 : M) :=
zero_right x
theorem ne_zero_of_not_isOrtho_self {B : BilinForm K V} (x : V) (hx₁ : ¬B.IsOrtho x x) : x ≠ 0 :=
fun hx₂ => hx₁ (hx₂.symm ▸ isOrtho_zero_left _)
theorem IsRefl.ortho_comm (H : B.IsRefl) {x y : M} : IsOrtho B x y ↔ IsOrtho B y x :=
⟨eq_zero H, eq_zero H⟩
theorem IsAlt.ortho_comm (H : B₁.IsAlt) {x y : M₁} : IsOrtho B₁ x y ↔ IsOrtho B₁ y x :=
LinearMap.IsAlt.ortho_comm H
theorem IsSymm.ortho_comm (H : B.IsSymm) {x y : M} : IsOrtho B x y ↔ IsOrtho B y x :=
LinearMap.IsSymm.ortho_comm H
/-- A set of vectors `v` is orthogonal with respect to some bilinear form `B` if and only
if for all `i ≠ j`, `B (v i) (v j) = 0`. For orthogonality between two elements, use
`BilinForm.IsOrtho` -/
def iIsOrtho {n : Type w} (B : BilinForm R M) (v : n → M) : Prop :=
B.IsOrthoᵢ v
theorem iIsOrtho_def {n : Type w} {B : BilinForm R M} {v : n → M} :
B.iIsOrtho v ↔ ∀ i j : n, i ≠ j → B (v i) (v j) = 0 :=
Iff.rfl
section
variable {R₄ M₄ : Type*} [CommRing R₄] [IsDomain R₄]
variable [AddCommGroup M₄] [Module R₄ M₄] {G : BilinForm R₄ M₄}
@[simp]
theorem isOrtho_smul_left {x y : M₄} {a : R₄} (ha : a ≠ 0) :
IsOrtho G (a • x) y ↔ IsOrtho G x y := by
dsimp only [IsOrtho]
rw [map_smul]
simp only [LinearMap.smul_apply, smul_eq_mul, mul_eq_zero, or_iff_right_iff_imp]
exact fun a ↦ (ha a).elim
@[simp]
theorem isOrtho_smul_right {x y : M₄} {a : R₄} (ha : a ≠ 0) :
IsOrtho G x (a • y) ↔ IsOrtho G x y := by
dsimp only [IsOrtho]
rw [map_smul]
simp only [smul_eq_mul, mul_eq_zero, or_iff_right_iff_imp]
exact fun a ↦ (ha a).elim
/-- A set of orthogonal vectors `v` with respect to some bilinear form `B` is linearly independent
if for all `i`, `B (v i) (v i) ≠ 0`. -/
theorem linearIndependent_of_iIsOrtho {n : Type w} {B : BilinForm K V} {v : n → V}
(hv₁ : B.iIsOrtho v) (hv₂ : ∀ i, ¬B.IsOrtho (v i) (v i)) : LinearIndependent K v := by
classical
rw [linearIndependent_iff']
intro s w hs i hi
have : B (s.sum fun i : n => w i • v i) (v i) = 0 := by rw [hs, zero_left]
have hsum : (s.sum fun j : n => w j * B (v j) (v i)) = w i * B (v i) (v i) := by
apply Finset.sum_eq_single_of_mem i hi
intro j _ hij
rw [iIsOrtho_def.1 hv₁ _ _ hij, mul_zero]
simp_rw [sum_left, smul_left, hsum] at this
exact eq_zero_of_ne_zero_of_mul_right_eq_zero (hv₂ i) this
end
section Orthogonal
/-- The orthogonal complement of a submodule `N` with respect to some bilinear form is the set of
elements `x` which are orthogonal to all elements of `N`; i.e., for all `y` in `N`, `B x y = 0`.
Note that for general (neither symmetric nor antisymmetric) bilinear forms this definition has a
chirality; in addition to this "left" orthogonal complement one could define a "right" orthogonal
complement for which, for all `y` in `N`, `B y x = 0`. This variant definition is not currently
provided in mathlib. -/
def orthogonal (B : BilinForm R M) (N : Submodule R M) : Submodule R M where
carrier := { m | ∀ n ∈ N, IsOrtho B n m }
zero_mem' x _ := isOrtho_zero_right x
add_mem' {x y} hx hy n hn := by
rw [IsOrtho, add_right, show B n x = 0 from hx n hn, show B n y = 0 from hy n hn, zero_add]
smul_mem' c x hx n hn := by
rw [IsOrtho, smul_right, show B n x = 0 from hx n hn, mul_zero]
variable {N L : Submodule R M}
@[simp]
theorem mem_orthogonal_iff {N : Submodule R M} {m : M} :
m ∈ B.orthogonal N ↔ ∀ n ∈ N, IsOrtho B n m :=
Iff.rfl
@[simp] lemma orthogonal_bot : B.orthogonal ⊥ = ⊤ := by ext; simp [IsOrtho]
theorem orthogonal_le (h : N ≤ L) : B.orthogonal L ≤ B.orthogonal N := fun _ hn l hl => hn l (h hl)
theorem le_orthogonal_orthogonal (b : B.IsRefl) : N ≤ B.orthogonal (B.orthogonal N) :=
fun n hn _ hm => b _ _ (hm n hn)
lemma orthogonal_top_eq_ker (hB : B.IsRefl) :
B.orthogonal ⊤ = LinearMap.ker B := by
ext; simp [LinearMap.BilinForm.IsOrtho, LinearMap.ext_iff, hB.eq_iff]
lemma orthogonal_top_eq_bot (hB : B.Nondegenerate) (hB₀ : B.IsRefl) :
B.orthogonal ⊤ = ⊥ :=
(Submodule.eq_bot_iff _).mpr fun _ hx ↦ hB _ fun y ↦ hB₀ _ _ <| hx y Submodule.mem_top
-- ↓ This lemma only applies in fields as we require `a * b = 0 → a = 0 ∨ b = 0`
theorem span_singleton_inf_orthogonal_eq_bot {B : BilinForm K V} {x : V} (hx : ¬B.IsOrtho x x) :
(K ∙ x) ⊓ B.orthogonal (K ∙ x) = ⊥ := by
rw [← Finset.coe_singleton]
refine eq_bot_iff.2 fun y h => ?_
obtain ⟨μ, -, rfl⟩ := Submodule.mem_span_finset.1 h.1
have := h.2 x ?_
· rw [Finset.sum_singleton] at this ⊢
suffices hμzero : μ x = 0 by rw [hμzero, zero_smul, Submodule.mem_bot]
change B x (μ x • x) = 0 at this
rw [smul_right] at this
exact eq_zero_of_ne_zero_of_mul_right_eq_zero hx this
· rw [Submodule.mem_span]
exact fun _ hp => hp <| Finset.mem_singleton_self _
-- ↓ This lemma only applies in fields since we use the `mul_eq_zero`
theorem orthogonal_span_singleton_eq_toLin_ker {B : BilinForm K V} (x : V) :
B.orthogonal (K ∙ x) = LinearMap.ker (LinearMap.BilinForm.toLinHomAux₁ B x) := by
ext y
simp_rw [mem_orthogonal_iff, LinearMap.mem_ker, Submodule.mem_span_singleton]
constructor
· exact fun h => h x ⟨1, one_smul _ _⟩
· rintro h _ ⟨z, rfl⟩
rw [IsOrtho, smul_left, mul_eq_zero]
exact Or.intro_right _ h
theorem span_singleton_sup_orthogonal_eq_top {B : BilinForm K V} {x : V} (hx : ¬B.IsOrtho x x) :
(K ∙ x) ⊔ B.orthogonal (K ∙ x) = ⊤ := by
rw [orthogonal_span_singleton_eq_toLin_ker]
exact LinearMap.span_singleton_sup_ker_eq_top _ hx
/-- Given a bilinear form `B` and some `x` such that `B x x ≠ 0`, the span of the singleton of `x`
is complement to its orthogonal complement. -/
theorem isCompl_span_singleton_orthogonal {B : BilinForm K V} {x : V} (hx : ¬B.IsOrtho x x) :
IsCompl (K ∙ x) (B.orthogonal <| K ∙ x) :=
{ disjoint := disjoint_iff.2 <| span_singleton_inf_orthogonal_eq_bot hx
codisjoint := codisjoint_iff.2 <| span_singleton_sup_orthogonal_eq_top hx }
end Orthogonal
variable {M₂' : Type*}
variable [AddCommMonoid M₂'] [Module R M₂']
/-- The restriction of a reflexive bilinear form `B` onto a submodule `W` is
nondegenerate if `Disjoint W (B.orthogonal W)`. -/
theorem nondegenerate_restrict_of_disjoint_orthogonal (B : BilinForm R₁ M₁) (b : B.IsRefl)
{W : Submodule R₁ M₁} (hW : Disjoint W (B.orthogonal W)) : (B.restrict W).Nondegenerate := by
rintro ⟨x, hx⟩ b₁
rw [Submodule.mk_eq_zero, ← Submodule.mem_bot R₁]
refine hW.le_bot ⟨hx, fun y hy => ?_⟩
specialize b₁ ⟨y, hy⟩
simp only [restrict_apply, domRestrict_apply] at b₁
exact isOrtho_def.mpr (b x y b₁)
/-- An orthogonal basis with respect to a nondegenerate bilinear form has no self-orthogonal
elements. -/
theorem iIsOrtho.not_isOrtho_basis_self_of_nondegenerate {n : Type w} [Nontrivial R]
{B : BilinForm R M} {v : Basis n R M} (h : B.iIsOrtho v) (hB : B.Nondegenerate) (i : n) :
¬B.IsOrtho (v i) (v i) := by
intro ho
refine v.ne_zero i (hB (v i) fun m => ?_)
obtain ⟨vi, rfl⟩ := v.repr.symm.surjective m
rw [Basis.repr_symm_apply, Finsupp.linearCombination_apply, Finsupp.sum, sum_right]
apply Finset.sum_eq_zero
rintro j -
rw [smul_right]
convert mul_zero (vi j) using 2
obtain rfl | hij := eq_or_ne i j
· exact ho
· exact h hij
/-- Given an orthogonal basis with respect to a bilinear form, the bilinear form is nondegenerate
iff the basis has no elements which are self-orthogonal. -/
theorem iIsOrtho.nondegenerate_iff_not_isOrtho_basis_self {n : Type w} [Nontrivial R]
[NoZeroDivisors R] (B : BilinForm R M) (v : Basis n R M) (hO : B.iIsOrtho v) :
B.Nondegenerate ↔ ∀ i, ¬B.IsOrtho (v i) (v i) := by
refine ⟨hO.not_isOrtho_basis_self_of_nondegenerate, fun ho m hB => ?_⟩
obtain ⟨vi, rfl⟩ := v.repr.symm.surjective m
rw [LinearEquiv.map_eq_zero_iff]
ext i
rw [Finsupp.zero_apply]
specialize hB (v i)
simp_rw [Basis.repr_symm_apply, Finsupp.linearCombination_apply, Finsupp.sum, sum_left,
smul_left] at hB
rw [Finset.sum_eq_single i] at hB
· exact eq_zero_of_ne_zero_of_mul_right_eq_zero (ho i) hB
· intro j _ hij
convert mul_zero (vi j) using 2
exact hO hij
· intro hi
convert zero_mul (M₀ := R) _ using 2
exact Finsupp.not_mem_support_iff.mp hi
section
theorem toLin_restrict_ker_eq_inf_orthogonal (B : BilinForm K V) (W : Subspace K V) (b : B.IsRefl) :
(LinearMap.ker <| B.domRestrict W).map W.subtype = (W ⊓ B.orthogonal ⊤ : Subspace K V) := by
ext x; constructor <;> intro hx
· rcases hx with ⟨⟨x, hx⟩, hker, rfl⟩
erw [LinearMap.mem_ker] at hker
constructor
· simp [hx]
· intro y _
rw [IsOrtho, b]
change (B.domRestrict W) ⟨x, hx⟩ y = 0
rw [hker]
rfl
· simp_rw [Submodule.mem_map, LinearMap.mem_ker]
refine ⟨⟨x, hx.1⟩, ?_, rfl⟩
ext y
change B x y = 0
rw [b]
exact hx.2 _ Submodule.mem_top
theorem toLin_restrict_range_dualCoannihilator_eq_orthogonal (B : BilinForm K V)
(W : Subspace K V) :
(LinearMap.range (B.domRestrict W)).dualCoannihilator = B.orthogonal W := by
ext x; constructor <;> rw [mem_orthogonal_iff] <;> intro hx
· intro y hy
rw [Submodule.mem_dualCoannihilator] at hx
exact hx (B.domRestrict W ⟨y, hy⟩) ⟨⟨y, hy⟩, rfl⟩
· rw [Submodule.mem_dualCoannihilator]
rintro _ ⟨⟨w, hw⟩, rfl⟩
exact hx w hw
lemma ker_restrict_eq_of_codisjoint {p q : Submodule R M} (hpq : Codisjoint p q)
{B : LinearMap.BilinForm R M} (hB : ∀ x ∈ p, ∀ y ∈ q, B x y = 0) :
LinearMap.ker (B.restrict p) = (LinearMap.ker B).comap p.subtype := by
ext ⟨z, hz⟩
simp only [LinearMap.mem_ker, Submodule.mem_comap, Submodule.coe_subtype]
refine ⟨fun h ↦ ?_, fun h ↦ ?_⟩
· ext w
obtain ⟨x, hx, y, hy, rfl⟩ := Submodule.exists_add_eq_of_codisjoint hpq w
simpa [hB z hz y hy] using LinearMap.congr_fun h ⟨x, hx⟩
· ext ⟨x, hx⟩
simpa using LinearMap.congr_fun h x
lemma inf_orthogonal_self_le_ker_restrict {W : Submodule R M} (b₁ : B.IsRefl) :
W ⊓ B.orthogonal W ≤ (LinearMap.ker <| B.restrict W).map W.subtype := by
rintro v ⟨hv : v ∈ W, hv' : v ∈ B.orthogonal W⟩
simp only [Submodule.mem_map, mem_ker, restrict_apply, Submodule.coe_subtype, Subtype.exists,
exists_and_left, exists_prop, exists_eq_right_right]
refine ⟨?_, hv⟩
ext ⟨w, hw⟩
exact b₁ w v <| hv' w hw
variable [FiniteDimensional K V]
open Module Submodule
variable {B : BilinForm K V}
theorem finrank_add_finrank_orthogonal (b₁ : B.IsRefl) (W : Submodule K V) :
finrank K W + finrank K (B.orthogonal W) =
finrank K V + finrank K (W ⊓ B.orthogonal ⊤ : Subspace K V) := by
rw [← toLin_restrict_ker_eq_inf_orthogonal _ _ b₁, ←
toLin_restrict_range_dualCoannihilator_eq_orthogonal _ _, finrank_map_subtype_eq]
conv_rhs =>
rw [← @Subspace.finrank_add_finrank_dualCoannihilator_eq K V _ _ _ _
(LinearMap.range (B.domRestrict W)),
add_comm, ← add_assoc, add_comm (finrank K (LinearMap.ker (B.domRestrict W))),
LinearMap.finrank_range_add_finrank_ker]
lemma finrank_orthogonal (hB : B.Nondegenerate) (hB₀ : B.IsRefl) (W : Submodule K V) :
finrank K (B.orthogonal W) = finrank K V - finrank K W := by
have := finrank_add_finrank_orthogonal hB₀ (W := W)
rw [B.orthogonal_top_eq_bot hB hB₀, inf_bot_eq, finrank_bot, add_zero] at this
omega
lemma orthogonal_orthogonal (hB : B.Nondegenerate) (hB₀ : B.IsRefl) (W : Submodule K V) :
B.orthogonal (B.orthogonal W) = W := by
apply (eq_of_le_of_finrank_le (LinearMap.BilinForm.le_orthogonal_orthogonal hB₀) _).symm
simp only [finrank_orthogonal hB hB₀]
omega
variable {W : Submodule K V}
lemma isCompl_orthogonal_iff_disjoint (hB₀ : B.IsRefl) :
IsCompl W (B.orthogonal W) ↔ Disjoint W (B.orthogonal W) := by
refine ⟨IsCompl.disjoint, fun h ↦ ⟨h, ?_⟩⟩
rw [codisjoint_iff]
apply (eq_top_of_finrank_eq <| (finrank_le _).antisymm _)
calc
finrank K V ≤ finrank K V + finrank K ↥(W ⊓ B.orthogonal ⊤) := le_self_add
_ ≤ finrank K ↥(W ⊔ B.orthogonal W) + finrank K ↥(W ⊓ B.orthogonal W) := ?_
_ ≤ finrank K ↥(W ⊔ B.orthogonal W) := by simp [h.eq_bot]
rw [finrank_sup_add_finrank_inf_eq, finrank_add_finrank_orthogonal hB₀ W]
/-- A subspace is complement to its orthogonal complement with respect to some
reflexive bilinear form if that bilinear form restricted on to the subspace is nondegenerate. -/
theorem isCompl_orthogonal_of_restrict_nondegenerate
(b₁ : B.IsRefl) (b₂ : (B.restrict W).Nondegenerate) : IsCompl W (B.orthogonal W) := by
have : W ⊓ B.orthogonal W = ⊥ := by
rw [eq_bot_iff]
intro x hx
obtain ⟨hx₁, hx₂⟩ := mem_inf.1 hx
refine Subtype.mk_eq_mk.1 (b₂ ⟨x, hx₁⟩ ?_)
rintro ⟨n, hn⟩
simp only [restrict_apply, domRestrict_apply]
exact b₁ n x (b₁ x n (b₁ n x (hx₂ n hn)))
refine IsCompl.of_eq this (eq_top_of_finrank_eq <| (finrank_le _).antisymm ?_)
conv_rhs => rw [← add_zero (finrank K _)]
rw [← finrank_bot K V, ← this, finrank_sup_add_finrank_inf_eq,
finrank_add_finrank_orthogonal b₁]
exact le_self_add
/-- A subspace is complement to its orthogonal complement with respect to some reflexive bilinear
form if and only if that bilinear form restricted on to the subspace is nondegenerate. -/
theorem restrict_nondegenerate_iff_isCompl_orthogonal
(b₁ : B.IsRefl) : (B.restrict W).Nondegenerate ↔ IsCompl W (B.orthogonal W) :=
⟨fun b₂ => isCompl_orthogonal_of_restrict_nondegenerate b₁ b₂, fun h =>
B.nondegenerate_restrict_of_disjoint_orthogonal b₁ h.1⟩
lemma orthogonal_eq_top_iff (b₁ : B.IsRefl) (b₂ : (B.restrict W).Nondegenerate) :
B.orthogonal W = ⊤ ↔ W = ⊥ := by
refine ⟨fun h ↦ ?_, fun h ↦ by simp [h]⟩
have := (B.isCompl_orthogonal_of_restrict_nondegenerate b₁ b₂).inf_eq_bot
rwa [h, inf_top_eq] at this
lemma eq_top_of_restrict_nondegenerate_of_orthogonal_eq_bot
(b₁ : B.IsRefl) (b₂ : (B.restrict W).Nondegenerate) (b₃ : B.orthogonal W = ⊥) :
W = ⊤ := by
have := (B.isCompl_orthogonal_of_restrict_nondegenerate b₁ b₂).sup_eq_top
rwa [b₃, sup_bot_eq] at this
lemma orthogonal_eq_bot_iff
(b₁ : B.IsRefl) (b₂ : (B.restrict W).Nondegenerate) (b₃ : B.Nondegenerate) :
B.orthogonal W = ⊥ ↔ W = ⊤ := by
refine ⟨eq_top_of_restrict_nondegenerate_of_orthogonal_eq_bot b₁ b₂, fun h ↦ ?_⟩
rw [h, eq_bot_iff]
exact fun x hx ↦ b₃ x fun y ↦ b₁ y x <| by simpa using hx y
end
/-! We note that we cannot use `BilinForm.restrict_nondegenerate_iff_isCompl_orthogonal` for the
lemma below since the below lemma does not require `V` to be finite dimensional. However,
`BilinForm.restrict_nondegenerate_iff_isCompl_orthogonal` does not require `B` to be nondegenerate
on the whole space. -/
/-- The restriction of a reflexive, non-degenerate bilinear form on the orthogonal complement of
the span of a singleton is also non-degenerate. -/
theorem restrict_nondegenerate_orthogonal_spanSingleton (B : BilinForm K V) (b₁ : B.Nondegenerate)
(b₂ : B.IsRefl) {x : V} (hx : ¬B.IsOrtho x x) :
Nondegenerate <| B.restrict <| B.orthogonal (K ∙ x) := by
refine fun m hm => Submodule.coe_eq_zero.1 (b₁ m.1 fun n => ?_)
have : n ∈ (K ∙ x) ⊔ B.orthogonal (K ∙ x) :=
(span_singleton_sup_orthogonal_eq_top hx).symm ▸ Submodule.mem_top
rcases Submodule.mem_sup.1 this with ⟨y, hy, z, hz, rfl⟩
specialize hm ⟨z, hz⟩
rw [restrict] at hm
erw [add_right, show B m.1 y = 0 by rw [b₂]; exact m.2 y hy, hm, add_zero]
end BilinForm
end LinearMap
| Mathlib/LinearAlgebra/BilinearForm/Orthogonal.lean | 418 | 425 | |
/-
Copyright (c) 2014 Jeremy Avigad. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Jeremy Avigad, Leonardo de Moura
-/
import Mathlib.Data.Set.Operations
import Mathlib.Order.Basic
import Mathlib.Order.BooleanAlgebra
import Mathlib.Tactic.Tauto
import Mathlib.Tactic.ByContra
import Mathlib.Util.Delaborators
import Mathlib.Tactic.Lift
/-!
# Basic properties of sets
Sets in Lean are homogeneous; all their elements have the same type. Sets whose elements
have type `X` are thus defined as `Set X := X → Prop`. Note that this function need not
be decidable. The definition is in the module `Mathlib.Data.Set.Defs`.
This file provides some basic definitions related to sets and functions not present in the
definitions file, as well as extra lemmas for functions defined in the definitions file and
`Mathlib.Data.Set.Operations` (empty set, univ, union, intersection, insert, singleton,
set-theoretic difference, complement, and powerset).
Note that a set is a term, not a type. There is a coercion from `Set α` to `Type*` sending
`s` to the corresponding subtype `↥s`.
See also the file `SetTheory/ZFC.lean`, which contains an encoding of ZFC set theory in Lean.
## Main definitions
Notation used here:
- `f : α → β` is a function,
- `s : Set α` and `s₁ s₂ : Set α` are subsets of `α`
- `t : Set β` is a subset of `β`.
Definitions in the file:
* `Nonempty s : Prop` : the predicate `s ≠ ∅`. Note that this is the preferred way to express the
fact that `s` has an element (see the Implementation Notes).
* `inclusion s₁ s₂ : ↥s₁ → ↥s₂` : the map `↥s₁ → ↥s₂` induced by an inclusion `s₁ ⊆ s₂`.
## Notation
* `sᶜ` for the complement of `s`
## Implementation notes
* `s.Nonempty` is to be preferred to `s ≠ ∅` or `∃ x, x ∈ s`. It has the advantage that
the `s.Nonempty` dot notation can be used.
* For `s : Set α`, do not use `Subtype s`. Instead use `↥s` or `(s : Type*)` or `s`.
## Tags
set, sets, subset, subsets, union, intersection, insert, singleton, complement, powerset
-/
assert_not_exists RelIso
/-! ### Set coercion to a type -/
open Function
universe u v
namespace Set
variable {α : Type u} {s t : Set α}
instance instBooleanAlgebra : 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
@[simp]
theorem bot_eq_empty : (⊥ : Set α) = ∅ :=
rfl
@[simp]
theorem sup_eq_union : ((· ⊔ ·) : Set α → Set α → Set α) = (· ∪ ·) :=
rfl
@[simp]
theorem inf_eq_inter : ((· ⊓ ·) : Set α → Set α → Set α) = (· ∩ ·) :=
rfl
@[simp]
theorem le_eq_subset : ((· ≤ ·) : Set α → Set α → Prop) = (· ⊆ ·) :=
rfl
@[simp]
theorem lt_eq_ssubset : ((· < ·) : Set α → Set α → Prop) = (· ⊂ ·) :=
rfl
theorem le_iff_subset : s ≤ t ↔ s ⊆ t :=
Iff.rfl
theorem lt_iff_ssubset : s < t ↔ s ⊂ t :=
Iff.rfl
alias ⟨_root_.LE.le.subset, _root_.HasSubset.Subset.le⟩ := le_iff_subset
alias ⟨_root_.LT.lt.ssubset, _root_.HasSSubset.SSubset.lt⟩ := lt_iff_ssubset
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
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
end Set
section SetCoe
variable {α : Type u}
instance (s : Set α) : CoeTC s α := ⟨fun x => x.1⟩
theorem Set.coe_eq_subtype (s : Set α) : ↥s = { x // x ∈ s } :=
rfl
@[simp]
theorem Set.coe_setOf (p : α → Prop) : ↥{ x | p x } = { x // p x } :=
rfl
theorem SetCoe.forall {s : Set α} {p : s → Prop} : (∀ x : s, p x) ↔ ∀ (x) (h : x ∈ s), p ⟨x, h⟩ :=
Subtype.forall
theorem SetCoe.exists {s : Set α} {p : s → Prop} :
(∃ x : s, p x) ↔ ∃ (x : _) (h : x ∈ s), p ⟨x, h⟩ :=
Subtype.exists
theorem SetCoe.exists' {s : Set α} {p : ∀ x, x ∈ s → Prop} :
(∃ (x : _) (h : x ∈ s), p x h) ↔ ∃ x : s, p x.1 x.2 :=
(@SetCoe.exists _ _ fun x => p x.1 x.2).symm
theorem SetCoe.forall' {s : Set α} {p : ∀ x, x ∈ s → Prop} :
(∀ (x) (h : x ∈ s), p x h) ↔ ∀ x : s, p x.1 x.2 :=
(@SetCoe.forall _ _ fun x => p x.1 x.2).symm
@[simp]
theorem set_coe_cast :
∀ {s t : Set α} (H' : s = t) (H : ↥s = ↥t) (x : s), cast H x = ⟨x.1, H' ▸ x.2⟩
| _, _, rfl, _, _ => rfl
theorem SetCoe.ext {s : Set α} {a b : s} : (a : α) = b → a = b :=
Subtype.eq
theorem SetCoe.ext_iff {s : Set α} {a b : s} : (↑a : α) = ↑b ↔ a = b :=
Iff.intro SetCoe.ext fun h => h ▸ rfl
end SetCoe
/-- See also `Subtype.prop` -/
theorem Subtype.mem {α : Type*} {s : Set α} (p : s) : (p : α) ∈ s :=
p.prop
/-- Duplicate of `Eq.subset'`, which currently has elaboration problems. -/
theorem Eq.subset {α} {s t : Set α} : s = t → s ⊆ t :=
fun h₁ _ h₂ => by rw [← h₁]; exact h₂
namespace Set
variable {α : Type u} {β : Type v} {a b : α} {s s₁ s₂ t t₁ t₂ u : Set α}
instance : Inhabited (Set α) :=
⟨∅⟩
@[trans]
theorem mem_of_mem_of_subset {x : α} {s t : Set α} (hx : x ∈ s) (h : s ⊆ t) : x ∈ t :=
h hx
theorem forall_in_swap {p : α → β → Prop} : (∀ a ∈ s, ∀ (b), p a b) ↔ ∀ (b), ∀ a ∈ s, p a b := by
tauto
theorem setOf_injective : Function.Injective (@setOf α) := injective_id
theorem setOf_inj {p q : α → Prop} : { x | p x } = { x | q x } ↔ p = q := Iff.rfl
/-! ### Lemmas about `mem` and `setOf` -/
theorem mem_setOf {a : α} {p : α → Prop} : a ∈ { x | p x } ↔ p a :=
Iff.rfl
/-- This lemma is intended for use with `rw` where a membership predicate is needed,
hence the explicit argument and the equality in the reverse direction from normal.
See also `Set.mem_setOf_eq` for the reverse direction applied to an argument. -/
theorem eq_mem_setOf (p : α → Prop) : p = (· ∈ {a | p a}) := rfl
/-- If `h : a ∈ {x | p x}` then `h.out : p x`. These are definitionally equal, but this can
nevertheless be useful for various reasons, e.g. to apply further projection notation or in an
argument to `simp`. -/
theorem _root_.Membership.mem.out {p : α → Prop} {a : α} (h : a ∈ { x | p x }) : p a :=
h
theorem nmem_setOf_iff {a : α} {p : α → Prop} : a ∉ { x | p x } ↔ ¬p a :=
Iff.rfl
@[simp]
theorem setOf_mem_eq {s : Set α} : { x | x ∈ s } = s :=
rfl
theorem setOf_set {s : Set α} : setOf s = s :=
rfl
theorem setOf_app_iff {p : α → Prop} {x : α} : { x | p x } x ↔ p x :=
Iff.rfl
theorem mem_def {a : α} {s : Set α} : a ∈ s ↔ s a :=
Iff.rfl
theorem setOf_bijective : Bijective (setOf : (α → Prop) → Set α) :=
bijective_id
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
theorem setOf_and {p q : α → Prop} : { a | p a ∧ q a } = { a | p a } ∩ { a | q a } :=
rfl
theorem setOf_or {p q : α → Prop} : { a | p a ∨ q a } = { a | p a } ∪ { a | q a } :=
rfl
/-! ### Subset and strict subset relations -/
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
theorem ssubset_def : (s ⊂ t) = (s ⊆ t ∧ ¬t ⊆ s) :=
rfl
@[refl]
theorem Subset.refl (a : Set α) : a ⊆ a := fun _ => id
theorem Subset.rfl {s : Set α} : s ⊆ s :=
Subset.refl s
@[trans]
theorem Subset.trans {a b c : Set α} (ab : a ⊆ b) (bc : b ⊆ c) : a ⊆ c := fun _ h => bc <| ab h
@[trans]
theorem mem_of_eq_of_mem {x y : α} {s : Set α} (hx : x = y) (h : y ∈ s) : x ∈ s :=
hx.symm ▸ h
theorem Subset.antisymm {a b : Set α} (h₁ : a ⊆ b) (h₂ : b ⊆ a) : a = b :=
Set.ext fun _ => ⟨@h₁ _, @h₂ _⟩
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⟩
-- an alternative name
theorem eq_of_subset_of_subset {a b : Set α} : a ⊆ b → b ⊆ a → a = b :=
Subset.antisymm
theorem mem_of_subset_of_mem {s₁ s₂ : Set α} {a : α} (h : s₁ ⊆ s₂) : a ∈ s₁ → a ∈ s₂ :=
@h _
theorem not_mem_subset (h : s ⊆ t) : a ∉ t → a ∉ s :=
mt <| mem_of_subset_of_mem h
theorem not_subset : ¬s ⊆ t ↔ ∃ a ∈ s, a ∉ t := by
simp only [subset_def, not_forall, exists_prop]
theorem not_top_subset : ¬⊤ ⊆ s ↔ ∃ a, a ∉ s := by
simp [not_subset]
lemma eq_of_forall_subset_iff (h : ∀ u, s ⊆ u ↔ t ⊆ u) : s = t := eq_of_forall_ge_iff h
/-! ### Definition of strict subsets `s ⊂ t` and basic properties. -/
protected theorem eq_or_ssubset_of_subset (h : s ⊆ t) : s = t ∨ s ⊂ t :=
eq_or_lt_of_le h
theorem exists_of_ssubset {s t : Set α} (h : s ⊂ t) : ∃ x ∈ t, x ∉ s :=
not_subset.1 h.2
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
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⟩⟩
theorem ssubset_iff_exists {s t : Set α} : s ⊂ t ↔ s ⊆ t ∧ ∃ x ∈ t, x ∉ s :=
⟨fun h ↦ ⟨h.le, Set.exists_of_ssubset h⟩, fun ⟨h1, h2⟩ ↦ (Set.ssubset_iff_of_subset h1).mpr h2⟩
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)⟩
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)⟩
theorem not_mem_empty (x : α) : ¬x ∈ (∅ : Set α) :=
id
theorem not_not_mem : ¬a ∉ s ↔ a ∈ s :=
not_not
/-! ### Non-empty sets -/
theorem nonempty_coe_sort {s : Set α} : Nonempty ↥s ↔ s.Nonempty :=
nonempty_subtype
alias ⟨_, Nonempty.coe_sort⟩ := nonempty_coe_sort
theorem nonempty_def : s.Nonempty ↔ ∃ x, x ∈ s :=
Iff.rfl
theorem nonempty_of_mem {x} (h : x ∈ s) : s.Nonempty :=
⟨x, h⟩
theorem Nonempty.not_subset_empty : s.Nonempty → ¬s ⊆ ∅
| ⟨_, hx⟩, hs => hs hx
/-- Extract a witness from `s.Nonempty`. This function might be used instead of case analysis
on the argument. Note that it makes a proof depend on the `Classical.choice` axiom. -/
protected noncomputable def Nonempty.some (h : s.Nonempty) : α :=
Classical.choose h
protected theorem Nonempty.some_mem (h : s.Nonempty) : h.some ∈ s :=
Classical.choose_spec h
theorem Nonempty.mono (ht : s ⊆ t) (hs : s.Nonempty) : t.Nonempty :=
hs.imp ht
theorem nonempty_of_not_subset (h : ¬s ⊆ t) : (s \ t).Nonempty :=
let ⟨x, xs, xt⟩ := not_subset.1 h
⟨x, xs, xt⟩
theorem nonempty_of_ssubset (ht : s ⊂ t) : (t \ s).Nonempty :=
nonempty_of_not_subset ht.2
theorem Nonempty.of_diff (h : (s \ t).Nonempty) : s.Nonempty :=
h.imp fun _ => And.left
theorem nonempty_of_ssubset' (ht : s ⊂ t) : t.Nonempty :=
(nonempty_of_ssubset ht).of_diff
theorem Nonempty.inl (hs : s.Nonempty) : (s ∪ t).Nonempty :=
hs.imp fun _ => Or.inl
theorem Nonempty.inr (ht : t.Nonempty) : (s ∪ t).Nonempty :=
ht.imp fun _ => Or.inr
@[simp]
theorem union_nonempty : (s ∪ t).Nonempty ↔ s.Nonempty ∨ t.Nonempty :=
exists_or
theorem Nonempty.left (h : (s ∩ t).Nonempty) : s.Nonempty :=
h.imp fun _ => And.left
theorem Nonempty.right (h : (s ∩ t).Nonempty) : t.Nonempty :=
h.imp fun _ => And.right
theorem inter_nonempty : (s ∩ t).Nonempty ↔ ∃ x, x ∈ s ∧ x ∈ t :=
Iff.rfl
theorem inter_nonempty_iff_exists_left : (s ∩ t).Nonempty ↔ ∃ x ∈ s, x ∈ t := by
simp_rw [inter_nonempty]
theorem inter_nonempty_iff_exists_right : (s ∩ t).Nonempty ↔ ∃ x ∈ t, x ∈ s := by
simp_rw [inter_nonempty, and_comm]
theorem nonempty_iff_univ_nonempty : Nonempty α ↔ (univ : Set α).Nonempty :=
⟨fun ⟨x⟩ => ⟨x, trivial⟩, fun ⟨x, _⟩ => ⟨x⟩⟩
@[simp]
theorem univ_nonempty : ∀ [Nonempty α], (univ : Set α).Nonempty
| ⟨x⟩ => ⟨x, trivial⟩
theorem Nonempty.to_subtype : s.Nonempty → Nonempty (↥s) :=
nonempty_subtype.2
theorem Nonempty.to_type : s.Nonempty → Nonempty α := fun ⟨x, _⟩ => ⟨x⟩
instance univ.nonempty [Nonempty α] : Nonempty (↥(Set.univ : Set α)) :=
Set.univ_nonempty.to_subtype
-- Redeclare for refined keys
-- `Nonempty (@Subtype _ (@Membership.mem _ (Set _) _ (@Top.top (Set _) _)))`
instance instNonemptyTop [Nonempty α] : Nonempty (⊤ : Set α) :=
inferInstanceAs (Nonempty (univ : Set α))
theorem Nonempty.of_subtype [Nonempty (↥s)] : s.Nonempty := nonempty_subtype.mp ‹_›
@[deprecated (since := "2024-11-23")] alias nonempty_of_nonempty_subtype := Nonempty.of_subtype
/-! ### Lemmas about the empty set -/
theorem empty_def : (∅ : Set α) = { _x : α | False } :=
rfl
@[simp]
theorem mem_empty_iff_false (x : α) : x ∈ (∅ : Set α) ↔ False :=
Iff.rfl
@[simp]
theorem setOf_false : { _a : α | False } = ∅ :=
rfl
@[simp] theorem setOf_bot : { _x : α | ⊥ } = ∅ := rfl
@[simp]
theorem empty_subset (s : Set α) : ∅ ⊆ s :=
nofun
@[simp]
theorem subset_empty_iff {s : Set α} : s ⊆ ∅ ↔ s = ∅ :=
(Subset.antisymm_iff.trans <| and_iff_left (empty_subset _)).symm
theorem eq_empty_iff_forall_not_mem {s : Set α} : s = ∅ ↔ ∀ x, x ∉ s :=
subset_empty_iff.symm
theorem eq_empty_of_forall_not_mem (h : ∀ x, x ∉ s) : s = ∅ :=
subset_empty_iff.1 h
theorem eq_empty_of_subset_empty {s : Set α} : s ⊆ ∅ → s = ∅ :=
subset_empty_iff.1
theorem eq_empty_of_isEmpty [IsEmpty α] (s : Set α) : s = ∅ :=
eq_empty_of_subset_empty fun x _ => isEmptyElim x
/-- There is exactly one set of a type that is empty. -/
instance uniqueEmpty [IsEmpty α] : Unique (Set α) where
default := ∅
uniq := eq_empty_of_isEmpty
/-- See also `Set.nonempty_iff_ne_empty`. -/
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]
/-- See also `Set.not_nonempty_iff_eq_empty`. -/
theorem nonempty_iff_ne_empty : s.Nonempty ↔ s ≠ ∅ :=
not_nonempty_iff_eq_empty.not_right
/-- See also `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]
/-- See also `not_nonempty_iff_eq_empty'`. -/
theorem nonempty_iff_ne_empty' : Nonempty s ↔ s ≠ ∅ :=
not_nonempty_iff_eq_empty'.not_right
alias ⟨Nonempty.ne_empty, _⟩ := nonempty_iff_ne_empty
@[simp]
theorem not_nonempty_empty : ¬(∅ : Set α).Nonempty := fun ⟨_, hx⟩ => hx
@[simp]
theorem isEmpty_coe_sort {s : Set α} : IsEmpty (↥s) ↔ s = ∅ :=
not_iff_not.1 <| by simpa using nonempty_iff_ne_empty
theorem eq_empty_or_nonempty (s : Set α) : s = ∅ ∨ s.Nonempty :=
or_iff_not_imp_left.2 nonempty_iff_ne_empty.2
theorem subset_eq_empty {s t : Set α} (h : t ⊆ s) (e : s = ∅) : t = ∅ :=
subset_empty_iff.1 <| e ▸ h
theorem forall_mem_empty {p : α → Prop} : (∀ x ∈ (∅ : Set α), p x) ↔ True :=
iff_true_intro fun _ => False.elim
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
alias ⟨_, Nonempty.empty_ssubset⟩ := empty_ssubset
/-!
### Universal set.
In Lean `@univ α` (or `univ : Set α`) is the set that contains all elements of type `α`.
Mathematically it is the same as `α` but it has a different type.
-/
@[simp]
theorem setOf_true : { _x : α | True } = univ :=
rfl
@[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⟩
theorem empty_ne_univ [Nonempty α] : (∅ : Set α) ≠ univ := fun e =>
not_isEmpty_of_nonempty α <| univ_eq_empty_iff.1 e.symm
@[simp]
theorem subset_univ (s : Set α) : s ⊆ univ := fun _ _ => trivial
@[simp]
theorem univ_subset_iff {s : Set α} : univ ⊆ s ↔ s = univ :=
@top_le_iff _ _ _ s
alias ⟨eq_univ_of_univ_subset, _⟩ := univ_subset_iff
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
theorem eq_univ_of_forall {s : Set α} : (∀ x, x ∈ s) → s = univ :=
eq_univ_iff_forall.2
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]
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)
theorem exists_mem_of_nonempty (α) : ∀ [Nonempty α], ∃ x : α, x ∈ (univ : Set α)
| ⟨x⟩ => ⟨x, trivial⟩
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]
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]
theorem univ_unique [Unique α] : @Set.univ α = {default} :=
Set.ext fun x => iff_of_true trivial <| Subsingleton.elim x default
theorem ssubset_univ_iff : s ⊂ univ ↔ s ≠ univ :=
lt_top_iff_ne_top
instance nontrivial_of_nonempty [Nonempty α] : Nontrivial (Set α) :=
⟨⟨∅, univ, empty_ne_univ⟩⟩
/-! ### Lemmas about union -/
theorem union_def {s₁ s₂ : Set α} : s₁ ∪ s₂ = { a | a ∈ s₁ ∨ a ∈ s₂ } :=
rfl
theorem mem_union_left {x : α} {a : Set α} (b : Set α) : x ∈ a → x ∈ a ∪ b :=
Or.inl
theorem mem_union_right {x : α} {b : Set α} (a : Set α) : x ∈ b → x ∈ a ∪ b :=
Or.inr
theorem mem_or_mem_of_mem_union {x : α} {a b : Set α} (H : x ∈ a ∪ b) : x ∈ a ∨ x ∈ b :=
H
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
@[simp]
theorem mem_union (x : α) (a b : Set α) : x ∈ a ∪ b ↔ x ∈ a ∨ x ∈ b :=
Iff.rfl
@[simp]
theorem union_self (a : Set α) : a ∪ a = a :=
ext fun _ => or_self_iff
@[simp]
theorem union_empty (a : Set α) : a ∪ ∅ = a :=
ext fun _ => iff_of_eq (or_false _)
@[simp]
theorem empty_union (a : Set α) : ∅ ∪ a = a :=
ext fun _ => iff_of_eq (false_or _)
theorem union_comm (a b : Set α) : a ∪ b = b ∪ a :=
ext fun _ => or_comm
theorem union_assoc (a b c : Set α) : a ∪ b ∪ c = a ∪ (b ∪ c) :=
ext fun _ => or_assoc
instance union_isAssoc : Std.Associative (α := Set α) (· ∪ ·) :=
⟨union_assoc⟩
instance union_isComm : Std.Commutative (α := Set α) (· ∪ ·) :=
⟨union_comm⟩
theorem union_left_comm (s₁ s₂ s₃ : Set α) : s₁ ∪ (s₂ ∪ s₃) = s₂ ∪ (s₁ ∪ s₃) :=
ext fun _ => or_left_comm
theorem union_right_comm (s₁ s₂ s₃ : Set α) : s₁ ∪ s₂ ∪ s₃ = s₁ ∪ s₃ ∪ s₂ :=
ext fun _ => or_right_comm
@[simp]
theorem union_eq_left {s t : Set α} : s ∪ t = s ↔ t ⊆ s :=
sup_eq_left
@[simp]
theorem union_eq_right {s t : Set α} : s ∪ t = t ↔ s ⊆ t :=
sup_eq_right
theorem union_eq_self_of_subset_left {s t : Set α} (h : s ⊆ t) : s ∪ t = t :=
union_eq_right.mpr h
theorem union_eq_self_of_subset_right {s t : Set α} (h : t ⊆ s) : s ∪ t = s :=
union_eq_left.mpr h
@[simp]
theorem subset_union_left {s t : Set α} : s ⊆ s ∪ t := fun _ => Or.inl
@[simp]
theorem subset_union_right {s t : Set α} : t ⊆ s ∪ t := fun _ => Or.inr
theorem union_subset {s t r : Set α} (sr : s ⊆ r) (tr : t ⊆ r) : s ∪ t ⊆ r := fun _ =>
Or.rec (@sr _) (@tr _)
@[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
@[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 _)
@[gcongr]
theorem union_subset_union_left {s₁ s₂ : Set α} (t) (h : s₁ ⊆ s₂) : s₁ ∪ t ⊆ s₂ ∪ t :=
union_subset_union h Subset.rfl
@[gcongr]
theorem union_subset_union_right (s) {t₁ t₂ : Set α} (h : t₁ ⊆ t₂) : s ∪ t₁ ⊆ s ∪ t₂ :=
union_subset_union Subset.rfl h
theorem subset_union_of_subset_left {s t : Set α} (h : s ⊆ t) (u : Set α) : s ⊆ t ∪ u :=
h.trans subset_union_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
theorem union_congr_left (ht : t ⊆ s ∪ u) (hu : u ⊆ s ∪ t) : s ∪ t = s ∪ u :=
sup_congr_left ht hu
theorem union_congr_right (hs : s ⊆ t ∪ u) (ht : t ⊆ s ∪ u) : s ∪ u = t ∪ u :=
sup_congr_right hs ht
theorem union_eq_union_iff_left : s ∪ t = s ∪ u ↔ t ⊆ s ∪ u ∧ u ⊆ s ∪ t :=
sup_eq_sup_iff_left
theorem union_eq_union_iff_right : s ∪ u = t ∪ u ↔ s ⊆ t ∪ u ∧ t ⊆ s ∪ u :=
sup_eq_sup_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
@[simp]
theorem union_univ (s : Set α) : s ∪ univ = univ := sup_top_eq _
@[simp]
theorem univ_union (s : Set α) : univ ∪ s = univ := top_sup_eq _
@[simp]
theorem ssubset_union_left_iff : s ⊂ s ∪ t ↔ ¬ t ⊆ s :=
left_lt_sup
@[simp]
theorem ssubset_union_right_iff : t ⊂ s ∪ t ↔ ¬ s ⊆ t :=
right_lt_sup
/-! ### Lemmas about intersection -/
theorem inter_def {s₁ s₂ : Set α} : s₁ ∩ s₂ = { a | a ∈ s₁ ∧ a ∈ s₂ } :=
rfl
@[simp, mfld_simps]
theorem mem_inter_iff (x : α) (a b : Set α) : x ∈ a ∩ b ↔ x ∈ a ∧ x ∈ b :=
Iff.rfl
theorem mem_inter {x : α} {a b : Set α} (ha : x ∈ a) (hb : x ∈ b) : x ∈ a ∩ b :=
⟨ha, hb⟩
theorem mem_of_mem_inter_left {x : α} {a b : Set α} (h : x ∈ a ∩ b) : x ∈ a :=
h.left
theorem mem_of_mem_inter_right {x : α} {a b : Set α} (h : x ∈ a ∩ b) : x ∈ b :=
h.right
@[simp]
theorem inter_self (a : Set α) : a ∩ a = a :=
ext fun _ => and_self_iff
@[simp]
theorem inter_empty (a : Set α) : a ∩ ∅ = ∅ :=
ext fun _ => iff_of_eq (and_false _)
@[simp]
theorem empty_inter (a : Set α) : ∅ ∩ a = ∅ :=
ext fun _ => iff_of_eq (false_and _)
theorem inter_comm (a b : Set α) : a ∩ b = b ∩ a :=
ext fun _ => and_comm
theorem inter_assoc (a b c : Set α) : a ∩ b ∩ c = a ∩ (b ∩ c) :=
ext fun _ => and_assoc
instance inter_isAssoc : Std.Associative (α := Set α) (· ∩ ·) :=
⟨inter_assoc⟩
instance inter_isComm : Std.Commutative (α := Set α) (· ∩ ·) :=
⟨inter_comm⟩
theorem inter_left_comm (s₁ s₂ s₃ : Set α) : s₁ ∩ (s₂ ∩ s₃) = s₂ ∩ (s₁ ∩ s₃) :=
ext fun _ => and_left_comm
theorem inter_right_comm (s₁ s₂ s₃ : Set α) : s₁ ∩ s₂ ∩ s₃ = s₁ ∩ s₃ ∩ s₂ :=
ext fun _ => and_right_comm
@[simp, mfld_simps]
theorem inter_subset_left {s t : Set α} : s ∩ t ⊆ s := fun _ => And.left
@[simp]
theorem inter_subset_right {s t : Set α} : s ∩ t ⊆ t := fun _ => And.right
theorem subset_inter {s t r : Set α} (rs : r ⊆ s) (rt : r ⊆ t) : r ⊆ s ∩ t := fun _ h =>
⟨rs h, rt h⟩
@[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
@[simp] lemma inter_eq_left : s ∩ t = s ↔ s ⊆ t := inf_eq_left
@[simp] lemma inter_eq_right : s ∩ t = t ↔ t ⊆ s := inf_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
theorem inter_eq_self_of_subset_right {s t : Set α} : t ⊆ s → s ∩ t = t :=
inter_eq_right.mpr
theorem inter_congr_left (ht : s ∩ u ⊆ t) (hu : s ∩ t ⊆ u) : s ∩ t = s ∩ u :=
inf_congr_left ht hu
theorem inter_congr_right (hs : t ∩ u ⊆ s) (ht : s ∩ u ⊆ t) : s ∩ u = t ∩ u :=
inf_congr_right hs ht
theorem inter_eq_inter_iff_left : s ∩ t = s ∩ u ↔ s ∩ u ⊆ t ∧ s ∩ t ⊆ u :=
inf_eq_inf_iff_left
theorem inter_eq_inter_iff_right : s ∩ u = t ∩ u ↔ t ∩ u ⊆ s ∧ s ∩ u ⊆ t :=
inf_eq_inf_iff_right
@[simp, mfld_simps]
theorem inter_univ (a : Set α) : a ∩ univ = a := inf_top_eq _
@[simp, mfld_simps]
theorem univ_inter (a : Set α) : univ ∩ a = a := top_inf_eq _
@[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 _)
@[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
@[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
theorem union_inter_cancel_left {s t : Set α} : (s ∪ t) ∩ s = s :=
inter_eq_self_of_subset_right subset_union_left
theorem union_inter_cancel_right {s t : Set α} : (s ∪ t) ∩ t = t :=
inter_eq_self_of_subset_right subset_union_right
theorem inter_setOf_eq_sep (s : Set α) (p : α → Prop) : s ∩ {a | p a} = {a ∈ s | p a} :=
rfl
theorem setOf_inter_eq_sep (p : α → Prop) (s : Set α) : {a | p a} ∩ s = {a ∈ s | p a} :=
inter_comm _ _
@[simp]
theorem inter_ssubset_right_iff : s ∩ t ⊂ t ↔ ¬ t ⊆ s :=
inf_lt_right
@[simp]
theorem inter_ssubset_left_iff : s ∩ t ⊂ s ↔ ¬ s ⊆ t :=
inf_lt_left
/-! ### Distributivity laws -/
theorem inter_union_distrib_left (s t u : Set α) : s ∩ (t ∪ u) = s ∩ t ∪ s ∩ u :=
inf_sup_left _ _ _
theorem union_inter_distrib_right (s t u : Set α) : (s ∪ t) ∩ u = s ∩ u ∪ t ∩ u :=
inf_sup_right _ _ _
theorem union_inter_distrib_left (s t u : Set α) : s ∪ t ∩ u = (s ∪ t) ∩ (s ∪ u) :=
sup_inf_left _ _ _
theorem inter_union_distrib_right (s t u : Set α) : s ∩ t ∪ u = (s ∪ u) ∩ (t ∪ u) :=
sup_inf_right _ _ _
theorem union_union_distrib_left (s t u : Set α) : s ∪ (t ∪ u) = s ∪ t ∪ (s ∪ u) :=
sup_sup_distrib_left _ _ _
theorem union_union_distrib_right (s t u : Set α) : s ∪ t ∪ u = s ∪ u ∪ (t ∪ u) :=
sup_sup_distrib_right _ _ _
theorem inter_inter_distrib_left (s t u : Set α) : s ∩ (t ∩ u) = s ∩ t ∩ (s ∩ u) :=
inf_inf_distrib_left _ _ _
theorem inter_inter_distrib_right (s t u : Set α) : s ∩ t ∩ u = s ∩ u ∩ (t ∩ u) :=
inf_inf_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 _ _ _ _
theorem inter_inter_inter_comm (s t u v : Set α) : s ∩ t ∩ (u ∩ v) = s ∩ u ∩ (t ∩ v) :=
inf_inf_inf_comm _ _ _ _
/-! ### Lemmas about sets defined as `{x ∈ s | p x}`. -/
section Sep
variable {p q : α → Prop} {x : α}
theorem mem_sep (xs : x ∈ s) (px : p x) : x ∈ { x ∈ s | p x } :=
⟨xs, px⟩
@[simp]
theorem sep_mem_eq : { x ∈ s | x ∈ t } = s ∩ t :=
rfl
@[simp]
theorem mem_sep_iff : x ∈ { x ∈ s | p x } ↔ x ∈ s ∧ p x :=
Iff.rfl
theorem sep_ext_iff : { x ∈ s | p x } = { x ∈ s | q x } ↔ ∀ x ∈ s, p x ↔ q x := by
simp_rw [Set.ext_iff, mem_sep_iff, and_congr_right_iff]
theorem sep_eq_of_subset (h : s ⊆ t) : { x ∈ t | x ∈ s } = s :=
inter_eq_self_of_subset_right h
@[simp]
theorem sep_subset (s : Set α) (p : α → Prop) : { x ∈ s | p x } ⊆ s := fun _ => And.left
@[simp]
theorem sep_eq_self_iff_mem_true : { x ∈ s | p x } = s ↔ ∀ x ∈ s, p x := by
simp_rw [Set.ext_iff, mem_sep_iff, and_iff_left_iff_imp]
@[simp]
theorem sep_eq_empty_iff_mem_false : { x ∈ s | p x } = ∅ ↔ ∀ x ∈ s, ¬p x := by
simp_rw [Set.ext_iff, mem_sep_iff, mem_empty_iff_false, iff_false, not_and]
theorem sep_true : { x ∈ s | True } = s :=
inter_univ s
theorem sep_false : { x ∈ s | False } = ∅ :=
inter_empty s
theorem sep_empty (p : α → Prop) : { x ∈ (∅ : Set α) | p x } = ∅ :=
empty_inter {x | p x}
theorem sep_univ : { x ∈ (univ : Set α) | p x } = { x | p x } :=
univ_inter {x | p x}
@[simp]
theorem sep_union : { x | (x ∈ s ∨ x ∈ t) ∧ p x } = { x ∈ s | p x } ∪ { x ∈ t | p x } :=
union_inter_distrib_right { x | x ∈ s } { x | x ∈ t } p
@[simp]
theorem sep_inter : { x | (x ∈ s ∧ x ∈ t) ∧ p x } = { x ∈ s | p x } ∩ { x ∈ t | p x } :=
inter_inter_distrib_right s t {x | p x}
@[simp]
theorem sep_and : { x ∈ s | p x ∧ q x } = { x ∈ s | p x } ∩ { x ∈ s | q x } :=
inter_inter_distrib_left s {x | p x} {x | q x}
@[simp]
theorem sep_or : { x ∈ s | p x ∨ q x } = { x ∈ s | p x } ∪ { x ∈ s | q x } :=
inter_union_distrib_left s p q
@[simp]
theorem sep_setOf : { x ∈ { y | p y } | q x } = { x | p x ∧ q x } :=
rfl
end Sep
/-- See also `Set.sdiff_inter_right_comm`. -/
lemma inter_diff_assoc (a b c : Set α) : (a ∩ b) \ c = a ∩ (b \ c) := inf_sdiff_assoc ..
/-- See also `Set.inter_diff_assoc`. -/
lemma sdiff_inter_right_comm (s t u : Set α) : s \ t ∩ u = (s ∩ u) \ t := sdiff_inf_right_comm ..
lemma inter_sdiff_left_comm (s t u : Set α) : s ∩ (t \ u) = t ∩ (s \ u) := inf_sdiff_left_comm ..
theorem diff_union_diff_cancel (hts : t ⊆ s) (hut : u ⊆ t) : s \ t ∪ t \ u = s \ u :=
sdiff_sup_sdiff_cancel hts hut
/-- A version of `diff_union_diff_cancel` with more general hypotheses. -/
theorem diff_union_diff_cancel' (hi : s ∩ u ⊆ t) (hu : t ⊆ s ∪ u) : (s \ t) ∪ (t \ u) = s \ u :=
sdiff_sup_sdiff_cancel' hi hu
theorem diff_diff_eq_sdiff_union (h : u ⊆ s) : s \ (t \ u) = s \ t ∪ u := sdiff_sdiff_eq_sdiff_sup h
theorem inter_diff_distrib_left (s t u : Set α) : s ∩ (t \ u) = (s ∩ t) \ (s ∩ u) :=
inf_sdiff_distrib_left _ _ _
theorem inter_diff_distrib_right (s t u : Set α) : (s \ t) ∩ u = (s ∩ u) \ (t ∩ u) :=
inf_sdiff_distrib_right _ _ _
theorem diff_inter_distrib_right (s t r : Set α) : (t ∩ r) \ s = (t \ s) ∩ (r \ s) :=
inf_sdiff
/-! ### Lemmas about complement -/
theorem compl_def (s : Set α) : sᶜ = { x | x ∉ s } :=
rfl
theorem mem_compl {s : Set α} {x : α} (h : x ∉ s) : x ∈ sᶜ :=
h
theorem compl_setOf {α} (p : α → Prop) : { a | p a }ᶜ = { a | ¬p a } :=
rfl
theorem not_mem_of_mem_compl {s : Set α} {x : α} (h : x ∈ sᶜ) : x ∉ s :=
h
theorem not_mem_compl_iff {x : α} : x ∉ sᶜ ↔ x ∈ s :=
not_not
@[simp]
theorem inter_compl_self (s : Set α) : s ∩ sᶜ = ∅ :=
inf_compl_eq_bot
@[simp]
theorem compl_inter_self (s : Set α) : sᶜ ∩ s = ∅ :=
compl_inf_eq_bot
@[simp]
theorem compl_empty : (∅ : Set α)ᶜ = univ :=
compl_bot
@[simp]
theorem compl_union (s t : Set α) : (s ∪ t)ᶜ = sᶜ ∩ tᶜ :=
compl_sup
theorem compl_inter (s t : Set α) : (s ∩ t)ᶜ = sᶜ ∪ tᶜ :=
compl_inf
@[simp]
theorem compl_univ : (univ : Set α)ᶜ = ∅ :=
compl_top
@[simp]
theorem compl_empty_iff {s : Set α} : sᶜ = ∅ ↔ s = univ :=
compl_eq_bot
@[simp]
theorem compl_univ_iff {s : Set α} : sᶜ = univ ↔ s = ∅ :=
compl_eq_top
theorem compl_ne_univ : sᶜ ≠ univ ↔ s.Nonempty :=
compl_univ_iff.not.trans nonempty_iff_ne_empty.symm
lemma inl_compl_union_inr_compl {α β : Type*} {s : Set α} {t : Set β} :
Sum.inl '' sᶜ ∪ Sum.inr '' tᶜ = (Sum.inl '' s ∪ Sum.inr '' t)ᶜ := by
rw [compl_union]
aesop
theorem nonempty_compl : sᶜ.Nonempty ↔ s ≠ univ :=
(ne_univ_iff_exists_not_mem s).symm
theorem union_eq_compl_compl_inter_compl (s t : Set α) : s ∪ t = (sᶜ ∩ tᶜ)ᶜ :=
ext fun _ => or_iff_not_and_not
theorem inter_eq_compl_compl_union_compl (s t : Set α) : s ∩ t = (sᶜ ∪ tᶜ)ᶜ :=
ext fun _ => and_iff_not_or_not
@[simp]
theorem union_compl_self (s : Set α) : s ∪ sᶜ = univ :=
eq_univ_iff_forall.2 fun _ => em _
@[simp]
theorem compl_union_self (s : Set α) : sᶜ ∪ s = univ := by rw [union_comm, union_compl_self]
theorem compl_subset_comm : sᶜ ⊆ t ↔ tᶜ ⊆ s :=
@compl_le_iff_compl_le _ s _ _
theorem subset_compl_comm : s ⊆ tᶜ ↔ t ⊆ sᶜ :=
@le_compl_iff_le_compl _ _ _ t
@[simp]
theorem compl_subset_compl : sᶜ ⊆ tᶜ ↔ t ⊆ s :=
@compl_le_compl_iff_le (Set α) _ _ _
@[gcongr] theorem compl_subset_compl_of_subset (h : t ⊆ s) : sᶜ ⊆ tᶜ := compl_subset_compl.2 h
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
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
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
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
/-! ### Lemmas about set difference -/
theorem not_mem_diff_of_mem {s t : Set α} {x : α} (hx : x ∈ t) : x ∉ s \ t := fun h => h.2 hx
theorem mem_of_mem_diff {s t : Set α} {x : α} (h : x ∈ s \ t) : x ∈ s :=
h.left
theorem not_mem_of_mem_diff {s t : Set α} {x : α} (h : x ∈ s \ t) : x ∉ t :=
h.right
theorem diff_eq_compl_inter {s t : Set α} : s \ t = tᶜ ∩ s := by rw [diff_eq, inter_comm]
theorem diff_nonempty {s t : Set α} : (s \ t).Nonempty ↔ ¬s ⊆ t :=
inter_compl_nonempty_iff
theorem diff_subset {s t : Set α} : s \ t ⊆ s := show s \ t ≤ s from sdiff_le
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
theorem union_diff_cancel {s t : Set α} (h : s ⊆ t) : s ∪ t \ s = t :=
sup_sdiff_cancel_right h
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
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
@[simp]
theorem union_diff_left {s t : Set α} : (s ∪ t) \ s = t \ s :=
sup_sdiff_left_self
@[simp]
theorem union_diff_right {s t : Set α} : (s ∪ t) \ t = s \ t :=
sup_sdiff_right_self
theorem union_diff_distrib {s t u : Set α} : (s ∪ t) \ u = s \ u ∪ t \ u :=
sup_sdiff
@[simp]
theorem inter_diff_self (a b : Set α) : a ∩ (b \ a) = ∅ :=
inf_sdiff_self_right
@[simp]
theorem inter_union_diff (s t : Set α) : s ∩ t ∪ s \ t = s :=
sup_inf_sdiff s t
@[simp]
theorem diff_union_inter (s t : Set α) : s \ t ∪ s ∩ t = s := by
rw [union_comm]
exact sup_inf_sdiff _ _
@[simp]
theorem inter_union_compl (s t : Set α) : s ∩ t ∪ s ∩ tᶜ = s :=
inter_union_diff _ _
@[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
@[gcongr]
theorem diff_subset_diff_left {s₁ s₂ t : Set α} (h : s₁ ⊆ s₂) : s₁ \ t ⊆ s₂ \ t :=
sdiff_le_sdiff_right ‹s₁ ≤ s₂›
@[gcongr]
theorem diff_subset_diff_right {s t u : Set α} (h : t ⊆ u) : s \ u ⊆ s \ t :=
sdiff_le_sdiff_left ‹t ≤ u›
theorem diff_subset_diff_iff_subset {r : Set α} (hs : s ⊆ r) (ht : t ⊆ r) :
r \ s ⊆ r \ t ↔ t ⊆ s :=
sdiff_le_sdiff_iff_le hs ht
theorem compl_eq_univ_diff (s : Set α) : sᶜ = univ \ s :=
top_sdiff.symm
@[simp]
theorem empty_diff (s : Set α) : (∅ \ s : Set α) = ∅ :=
bot_sdiff
theorem diff_eq_empty {s t : Set α} : s \ t = ∅ ↔ s ⊆ t :=
sdiff_eq_bot_iff
@[simp]
theorem diff_empty {s : Set α} : s \ ∅ = s :=
sdiff_bot
@[simp]
theorem diff_univ (s : Set α) : s \ univ = ∅ :=
diff_eq_empty.2 (subset_univ s)
theorem diff_diff {u : Set α} : (s \ t) \ u = s \ (t ∪ u) :=
sdiff_sdiff_left
-- 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
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
theorem subset_diff_union (s t : Set α) : s ⊆ s \ t ∪ t :=
show s ≤ s \ t ∪ t from le_sdiff_sup
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 _ _)
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
theorem diff_inter {s t u : Set α} : s \ (t ∩ u) = s \ t ∪ s \ u :=
sdiff_inf
theorem diff_inter_diff : s \ t ∩ (s \ u) = s \ (t ∪ u) :=
sdiff_sup.symm
theorem diff_compl : s \ tᶜ = s ∩ t :=
sdiff_compl
theorem compl_diff : (t \ s)ᶜ = s ∪ tᶜ :=
Eq.trans compl_sdiff himp_eq
theorem diff_diff_right {s t u : Set α} : s \ (t \ u) = s \ t ∪ s ∩ u :=
sdiff_sdiff_right'
theorem inter_diff_right_comm : (s ∩ t) \ u = s \ u ∩ t := by
rw [diff_eq, diff_eq, inter_right_comm]
theorem diff_inter_right_comm : (s \ u) ∩ t = (s ∩ t) \ u := by
rw [diff_eq, diff_eq, inter_right_comm]
@[simp]
theorem union_diff_self {s t : Set α} : s ∪ t \ s = s ∪ t :=
sup_sdiff_self _ _
@[simp]
theorem diff_union_self {s t : Set α} : s \ t ∪ t = s ∪ t :=
sdiff_sup_self _ _
@[simp]
theorem diff_inter_self {a b : Set α} : b \ a ∩ a = ∅ :=
inf_sdiff_self_left
@[simp]
theorem diff_inter_self_eq_diff {s t : Set α} : s \ (t ∩ s) = s \ t :=
sdiff_inf_self_right _ _
@[simp]
theorem diff_self_inter {s t : Set α} : s \ (s ∩ t) = s \ t :=
sdiff_inf_self_left _ _
theorem diff_self {s : Set α} : s \ s = ∅ :=
sdiff_self
theorem diff_diff_right_self (s t : Set α) : s \ (s \ t) = s ∩ t :=
sdiff_sdiff_right_self
theorem diff_diff_cancel_left {s t : Set α} (h : s ⊆ t) : t \ (t \ s) = s :=
sdiff_sdiff_eq_self h
theorem union_eq_diff_union_diff_union_inter (s t : Set α) : s ∪ t = s \ t ∪ t \ s ∪ s ∩ t :=
sup_eq_sdiff_sup_sdiff_sup_inf
/-! ### Powerset -/
theorem mem_powerset {x s : Set α} (h : x ⊆ s) : x ∈ 𝒫 s := @h
theorem subset_of_mem_powerset {x s : Set α} (h : x ∈ 𝒫 s) : x ⊆ s := @h
@[simp]
theorem mem_powerset_iff (x s : Set α) : x ∈ 𝒫 s ↔ x ⊆ s :=
Iff.rfl
theorem powerset_inter (s t : Set α) : 𝒫(s ∩ t) = 𝒫 s ∩ 𝒫 t :=
ext fun _ => subset_inter_iff
@[simp]
theorem powerset_mono : 𝒫 s ⊆ 𝒫 t ↔ s ⊆ t :=
⟨fun h => @h _ (fun _ h => h), fun h _ hu _ ha => h (hu ha)⟩
theorem monotone_powerset : Monotone (powerset : Set α → Set (Set α)) := fun _ _ => powerset_mono.2
@[simp]
theorem powerset_nonempty : (𝒫 s).Nonempty :=
⟨∅, fun _ h => empty_subset s h⟩
@[simp]
theorem powerset_empty : 𝒫(∅ : Set α) = {∅} :=
ext fun _ => subset_empty_iff
@[simp]
theorem powerset_univ : 𝒫(univ : Set α) = univ :=
eq_univ_of_forall subset_univ
/-! ### Sets defined as an if-then-else -/
@[deprecated _root_.mem_dite (since := "2025-01-30")]
protected theorem mem_dite (p : Prop) [Decidable p] (s : p → Set α) (t : ¬ p → Set α) (x : α) :
(x ∈ if h : p then s h else t h) ↔ (∀ h : p, x ∈ s h) ∧ ∀ h : ¬p, x ∈ t h :=
_root_.mem_dite
theorem mem_dite_univ_right (p : Prop) [Decidable p] (t : p → Set α) (x : α) :
(x ∈ if h : p then t h else univ) ↔ ∀ h : p, x ∈ t h := by
simp [mem_dite]
@[simp]
theorem mem_ite_univ_right (p : Prop) [Decidable p] (t : Set α) (x : α) :
x ∈ ite p t Set.univ ↔ p → x ∈ t :=
mem_dite_univ_right p (fun _ => t) x
theorem mem_dite_univ_left (p : Prop) [Decidable p] (t : ¬p → Set α) (x : α) :
(x ∈ if h : p then univ else t h) ↔ ∀ h : ¬p, x ∈ t h := by
split_ifs <;> simp_all
@[simp]
theorem mem_ite_univ_left (p : Prop) [Decidable p] (t : Set α) (x : α) :
x ∈ ite p Set.univ t ↔ ¬p → x ∈ t :=
mem_dite_univ_left p (fun _ => t) x
theorem mem_dite_empty_right (p : Prop) [Decidable p] (t : p → Set α) (x : α) :
(x ∈ if h : p then t h else ∅) ↔ ∃ h : p, x ∈ t h := by
simp only [mem_dite, mem_empty_iff_false, imp_false, not_not]
exact ⟨fun h => ⟨h.2, h.1 h.2⟩, fun ⟨h₁, h₂⟩ => ⟨fun _ => h₂, h₁⟩⟩
@[simp]
theorem mem_ite_empty_right (p : Prop) [Decidable p] (t : Set α) (x : α) :
x ∈ ite p t ∅ ↔ p ∧ x ∈ t :=
(mem_dite_empty_right p (fun _ => t) x).trans (by simp)
theorem mem_dite_empty_left (p : Prop) [Decidable p] (t : ¬p → Set α) (x : α) :
(x ∈ if h : p then ∅ else t h) ↔ ∃ h : ¬p, x ∈ t h := by
simp only [mem_dite, mem_empty_iff_false, imp_false]
exact ⟨fun h => ⟨h.1, h.2 h.1⟩, fun ⟨h₁, h₂⟩ => ⟨fun h => h₁ h, fun _ => h₂⟩⟩
@[simp]
theorem mem_ite_empty_left (p : Prop) [Decidable p] (t : Set α) (x : α) :
x ∈ ite p ∅ t ↔ ¬p ∧ x ∈ t :=
(mem_dite_empty_left p (fun _ => t) x).trans (by simp)
/-! ### If-then-else for sets -/
/-- `ite` for sets: `Set.ite t s s' ∩ t = s ∩ t`, `Set.ite t s s' ∩ tᶜ = s' ∩ tᶜ`.
Defined as `s ∩ t ∪ s' \ t`. -/
protected def ite (t s s' : Set α) : Set α :=
s ∩ t ∪ s' \ t
@[simp]
theorem ite_inter_self (t s s' : Set α) : t.ite s s' ∩ t = s ∩ t := by
rw [Set.ite, union_inter_distrib_right, diff_inter_self, inter_assoc, inter_self, union_empty]
@[simp]
theorem ite_compl (t s s' : Set α) : tᶜ.ite s s' = t.ite s' s := by
rw [Set.ite, Set.ite, diff_compl, union_comm, diff_eq]
@[simp]
theorem ite_inter_compl_self (t s s' : Set α) : t.ite s s' ∩ tᶜ = s' ∩ tᶜ := by
rw [← ite_compl, ite_inter_self]
@[simp]
theorem ite_diff_self (t s s' : Set α) : t.ite s s' \ t = s' \ t :=
ite_inter_compl_self t s s'
@[simp]
theorem ite_same (t s : Set α) : t.ite s s = s :=
inter_union_diff _ _
@[simp]
theorem ite_left (s t : Set α) : s.ite s t = s ∪ t := by simp [Set.ite]
@[simp]
theorem ite_right (s t : Set α) : s.ite t s = t ∩ s := by simp [Set.ite]
@[simp]
theorem ite_empty (s s' : Set α) : Set.ite ∅ s s' = s' := by simp [Set.ite]
@[simp]
theorem ite_univ (s s' : Set α) : Set.ite univ s s' = s := by simp [Set.ite]
@[simp]
theorem ite_empty_left (t s : Set α) : t.ite ∅ s = s \ t := by simp [Set.ite]
@[simp]
theorem ite_empty_right (t s : Set α) : t.ite s ∅ = s ∩ t := by simp [Set.ite]
theorem ite_mono (t : Set α) {s₁ s₁' s₂ s₂' : Set α} (h : s₁ ⊆ s₂) (h' : s₁' ⊆ s₂') :
t.ite s₁ s₁' ⊆ t.ite s₂ s₂' :=
union_subset_union (inter_subset_inter_left _ h) (inter_subset_inter_left _ h')
theorem ite_subset_union (t s s' : Set α) : t.ite s s' ⊆ s ∪ s' :=
union_subset_union inter_subset_left diff_subset
theorem inter_subset_ite (t s s' : Set α) : s ∩ s' ⊆ t.ite s s' :=
ite_same t (s ∩ s') ▸ ite_mono _ inter_subset_left inter_subset_right
theorem ite_inter_inter (t s₁ s₂ s₁' s₂' : Set α) :
t.ite (s₁ ∩ s₂) (s₁' ∩ s₂') = t.ite s₁ s₁' ∩ t.ite s₂ s₂' := by
ext x
simp only [Set.ite, Set.mem_inter_iff, Set.mem_diff, Set.mem_union]
tauto
theorem ite_inter (t s₁ s₂ s : Set α) : t.ite (s₁ ∩ s) (s₂ ∩ s) = t.ite s₁ s₂ ∩ s := by
rw [ite_inter_inter, ite_same]
theorem ite_inter_of_inter_eq (t : Set α) {s₁ s₂ s : Set α} (h : s₁ ∩ s = s₂ ∩ s) :
t.ite s₁ s₂ ∩ s = s₁ ∩ s := by rw [← ite_inter, ← h, ite_same]
theorem subset_ite {t s s' u : Set α} : u ⊆ t.ite s s' ↔ u ∩ t ⊆ s ∧ u \ t ⊆ s' := by
simp only [subset_def, ← forall_and]
refine forall_congr' fun x => ?_
by_cases hx : x ∈ t <;> simp [*, Set.ite]
theorem ite_eq_of_subset_left (t : Set α) {s₁ s₂ : Set α} (h : s₁ ⊆ s₂) :
t.ite s₁ s₂ = s₁ ∪ (s₂ \ t) := by
ext x
by_cases hx : x ∈ t <;> simp [*, Set.ite, or_iff_right_of_imp (@h x)]
theorem ite_eq_of_subset_right (t : Set α) {s₁ s₂ : Set α} (h : s₂ ⊆ s₁) :
t.ite s₁ s₂ = (s₁ ∩ t) ∪ s₂ := by
ext x
by_cases hx : x ∈ t <;> simp [*, Set.ite, or_iff_left_of_imp (@h x)]
end Set
open Set
namespace Function
variable {α : Type*} {β : Type*}
theorem Injective.nonempty_apply_iff {f : Set α → Set β} (hf : Injective f) (h2 : f ∅ = ∅)
{s : Set α} : (f s).Nonempty ↔ s.Nonempty := by
rw [nonempty_iff_ne_empty, ← h2, nonempty_iff_ne_empty, hf.ne_iff]
end Function
namespace Subsingleton
variable {α : Type*} [Subsingleton α]
theorem eq_univ_of_nonempty {s : Set α} : s.Nonempty → s = univ := fun ⟨x, hx⟩ =>
eq_univ_of_forall fun y => Subsingleton.elim x y ▸ hx
@[elab_as_elim]
theorem set_cases {p : Set α → Prop} (h0 : p ∅) (h1 : p univ) (s) : p s :=
(s.eq_empty_or_nonempty.elim fun h => h.symm ▸ h0) fun h => (eq_univ_of_nonempty h).symm ▸ h1
theorem mem_iff_nonempty {α : Type*} [Subsingleton α] {s : Set α} {x : α} : x ∈ s ↔ s.Nonempty :=
⟨fun hx => ⟨x, hx⟩, fun ⟨y, hy⟩ => Subsingleton.elim y x ▸ hy⟩
end Subsingleton
/-! ### Decidability instances for sets -/
namespace Set
variable {α : Type u} (s t : Set α) (a b : α)
instance decidableSdiff [Decidable (a ∈ s)] [Decidable (a ∈ t)] : Decidable (a ∈ s \ t) :=
inferInstanceAs (Decidable (a ∈ s ∧ a ∉ t))
instance decidableInter [Decidable (a ∈ s)] [Decidable (a ∈ t)] : Decidable (a ∈ s ∩ t) :=
inferInstanceAs (Decidable (a ∈ s ∧ a ∈ t))
instance decidableUnion [Decidable (a ∈ s)] [Decidable (a ∈ t)] : Decidable (a ∈ s ∪ t) :=
inferInstanceAs (Decidable (a ∈ s ∨ a ∈ t))
instance decidableCompl [Decidable (a ∈ s)] : Decidable (a ∈ sᶜ) :=
inferInstanceAs (Decidable (a ∉ s))
instance decidableEmptyset : Decidable (a ∈ (∅ : Set α)) := Decidable.isFalse (by simp)
instance decidableUniv : Decidable (a ∈ univ) := Decidable.isTrue (by simp)
instance decidableInsert [Decidable (a = b)] [Decidable (a ∈ s)] : Decidable (a ∈ insert b s) :=
inferInstanceAs (Decidable (_ ∨ _))
instance decidableSetOf (p : α → Prop) [Decidable (p a)] : Decidable (a ∈ { a | p a }) := by
assumption
end Set
variable {α : Type*} {s t u : Set α}
namespace Equiv
/-- Given a predicate `p : α → Prop`, produces an equivalence between
`Set {a : α // p a}` and `{s : Set α // ∀ a ∈ s, p a}`. -/
protected def setSubtypeComm (p : α → Prop) :
Set {a : α // p a} ≃ {s : Set α // ∀ a ∈ s, p a} where
toFun s := ⟨{a | ∃ h : p a, s ⟨a, h⟩}, fun _ h ↦ h.1⟩
invFun s := {a | a.val ∈ s.val}
left_inv s := by ext a; exact ⟨fun h ↦ h.2, fun h ↦ ⟨a.property, h⟩⟩
right_inv s := by ext; exact ⟨fun h ↦ h.2, fun h ↦ ⟨s.property _ h, h⟩⟩
@[simp]
protected lemma setSubtypeComm_apply (p : α → Prop) (s : Set {a // p a}) :
(Equiv.setSubtypeComm p) s = ⟨{a | ∃ h : p a, ⟨a, h⟩ ∈ s}, fun _ h ↦ h.1⟩ :=
rfl
@[simp]
protected lemma setSubtypeComm_symm_apply (p : α → Prop) (s : {s // ∀ a ∈ s, p a}) :
(Equiv.setSubtypeComm p).symm s = {a | a.val ∈ s.val} :=
rfl
end Equiv
| Mathlib/Data/Set/Basic.lean | 2,235 | 2,237 | |
/-
Copyright (c) 2023 Bhavik Mehta, Rishi Mehta, Linus Sommer. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Bhavik Mehta, Rishi Mehta, Linus Sommer
-/
import Mathlib.Algebra.GroupWithZero.Nat
import Mathlib.Algebra.Order.Group.Nat
import Mathlib.Combinatorics.SimpleGraph.Path
/-!
# Hamiltonian Graphs
In this file we introduce hamiltonian paths, cycles and graphs.
## Main definitions
- `SimpleGraph.Walk.IsHamiltonian`: Predicate for a walk to be hamiltonian.
- `SimpleGraph.Walk.IsHamiltonianCycle`: Predicate for a walk to be a hamiltonian cycle.
- `SimpleGraph.IsHamiltonian`: Predicate for a graph to be hamiltonian.
-/
open Finset Function
namespace SimpleGraph
variable {α β : Type*} [DecidableEq α] [DecidableEq β] {G : SimpleGraph α}
{a b : α} {p : G.Walk a b}
namespace Walk
/-- A hamiltonian path is a walk `p` that visits every vertex exactly once. Note that while
this definition doesn't contain that `p` is a path, `p.isPath` gives that. -/
def IsHamiltonian (p : G.Walk a b) : Prop := ∀ a, p.support.count a = 1
lemma IsHamiltonian.map {H : SimpleGraph β} (f : G →g H) (hf : Bijective f) (hp : p.IsHamiltonian) :
(p.map f).IsHamiltonian := by
simp [IsHamiltonian, hf.surjective.forall, hf.injective, hp _]
/-- A hamiltonian path visits every vertex. -/
@[simp] lemma IsHamiltonian.mem_support (hp : p.IsHamiltonian) (c : α) : c ∈ p.support := by
simp only [← List.count_pos_iff, hp _, Nat.zero_lt_one]
/-- Hamiltonian paths are paths. -/
lemma IsHamiltonian.isPath (hp : p.IsHamiltonian) : p.IsPath :=
IsPath.mk' <| List.nodup_iff_count_le_one.2 <| (le_of_eq <| hp ·)
/-- A path whose support contains every vertex is hamiltonian. -/
lemma IsPath.isHamiltonian_of_mem (hp : p.IsPath) (hp' : ∀ w, w ∈ p.support) :
p.IsHamiltonian := fun _ ↦
le_antisymm (List.nodup_iff_count_le_one.1 hp.support_nodup _) (List.count_pos_iff.2 (hp' _))
lemma IsPath.isHamiltonian_iff (hp : p.IsPath) : p.IsHamiltonian ↔ ∀ w, w ∈ p.support :=
⟨(·.mem_support), hp.isHamiltonian_of_mem⟩
section
variable [Fintype α]
/-- The support of a hamiltonian walk is the entire vertex set. -/
lemma IsHamiltonian.support_toFinset (hp : p.IsHamiltonian) : p.support.toFinset = Finset.univ := by
simp [eq_univ_iff_forall, hp]
/-- The length of a hamiltonian path is one less than the number of vertices of the graph. -/
lemma IsHamiltonian.length_eq (hp : p.IsHamiltonian) : p.length = Fintype.card α - 1 :=
eq_tsub_of_add_eq <| by
rw [← length_support, ← List.sum_toFinset_count_eq_length, Finset.sum_congr rfl fun _ _ ↦ hp _,
← card_eq_sum_ones, hp.support_toFinset, card_univ]
end
/-- A hamiltonian cycle is a cycle that visits every vertex once. -/
structure IsHamiltonianCycle (p : G.Walk a a) : Prop extends p.IsCycle where
isHamiltonian_tail : p.tail.IsHamiltonian
variable {p : G.Walk a a}
lemma IsHamiltonianCycle.isCycle (hp : p.IsHamiltonianCycle) : p.IsCycle :=
hp.toIsCycle
lemma IsHamiltonianCycle.map {H : SimpleGraph β} (f : G →g H) (hf : Bijective f)
(hp : p.IsHamiltonianCycle) : (p.map f).IsHamiltonianCycle where
toIsCycle := hp.isCycle.map hf.injective
isHamiltonian_tail := by
simp only [IsHamiltonian, hf.surjective.forall]
intro x
rcases p with (_ | ⟨y, p⟩)
· cases hp.ne_nil rfl
simp only [map_cons, getVert_cons_succ, tail_cons_eq, support_copy,support_map]
rw [List.count_map_of_injective _ _ hf.injective, ← support_copy, ← tail_cons_eq]
exact hp.isHamiltonian_tail _
lemma isHamiltonianCycle_isCycle_and_isHamiltonian_tail :
p.IsHamiltonianCycle ↔ p.IsCycle ∧ p.tail.IsHamiltonian :=
⟨fun ⟨h, h'⟩ ↦ ⟨h, h'⟩, fun ⟨h, h'⟩ ↦ ⟨h, h'⟩⟩
lemma isHamiltonianCycle_iff_isCycle_and_support_count_tail_eq_one :
p.IsHamiltonianCycle ↔ p.IsCycle ∧ ∀ a, (support p).tail.count a = 1 := by
simp +contextual [isHamiltonianCycle_isCycle_and_isHamiltonian_tail,
IsHamiltonian, support_tail, IsCycle.not_nil, exists_prop]
/-- A hamiltonian cycle visits every vertex. -/
lemma IsHamiltonianCycle.mem_support (hp : p.IsHamiltonianCycle) (b : α) :
b ∈ p.support :=
List.mem_of_mem_tail <| support_tail p hp.1.not_nil ▸ hp.isHamiltonian_tail.mem_support _
/-- The length of a hamiltonian cycle is the number of vertices. -/
lemma IsHamiltonianCycle.length_eq [Fintype α] (hp : p.IsHamiltonianCycle) :
p.length = Fintype.card α := by
rw [← length_tail_add_one hp.not_nil, hp.isHamiltonian_tail.length_eq, Nat.sub_add_cancel]
rw [Nat.succ_le, Fintype.card_pos_iff]
exact ⟨a⟩
| lemma IsHamiltonianCycle.count_support_self (hp : p.IsHamiltonianCycle) :
p.support.count a = 2 := by
rw [support_eq_cons, List.count_cons_self, ← support_tail _ hp.1.not_nil, hp.isHamiltonian_tail]
| Mathlib/Combinatorics/SimpleGraph/Hamiltonian.lean | 111 | 113 |
/-
Copyright (c) 2022 Andrew Yang. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Andrew Yang
-/
import Mathlib.Topology.Homeomorph.Lemmas
import Mathlib.Topology.Sets.OpenCover
import Mathlib.Topology.LocallyClosed
/-!
# Properties of maps that are local at the target or at the source.
We show that the following properties of continuous maps are local at the target :
- `IsInducing`
- `IsOpenMap`
- `IsClosedMap`
- `IsEmbedding`
- `IsOpenEmbedding`
- `IsClosedEmbedding`
- `GeneralizingMap`
We show that the following properties of continuous maps are local at the source:
- `IsOpenMap`
- `GeneralizingMap`
-/
open Filter Set TopologicalSpace Topology
variable {α β : Type*} [TopologicalSpace α] [TopologicalSpace β] {f : α → β}
variable {ι : Type*} {U : ι → Opens β}
theorem Set.restrictPreimage_isInducing (s : Set β) (h : IsInducing f) :
IsInducing (s.restrictPreimage f) := by
simp_rw [← IsInducing.subtypeVal.of_comp_iff, isInducing_iff_nhds, restrictPreimage,
MapsTo.coe_restrict, restrict_eq, ← @Filter.comap_comap _ _ _ _ _ f, Function.comp_apply] at h ⊢
intro a
rw [← h, ← IsInducing.subtypeVal.nhds_eq_comap]
@[deprecated (since := "2024-10-28")]
alias Set.restrictPreimage_inducing := Set.restrictPreimage_isInducing
alias Topology.IsInducing.restrictPreimage := Set.restrictPreimage_isInducing
@[deprecated (since := "2024-10-28")] alias Inducing.restrictPreimage := IsInducing.restrictPreimage
theorem Set.restrictPreimage_isEmbedding (s : Set β) (h : IsEmbedding f) :
IsEmbedding (s.restrictPreimage f) :=
⟨h.1.restrictPreimage s, h.2.restrictPreimage s⟩
@[deprecated (since := "2024-10-26")]
alias Set.restrictPreimage_embedding := Set.restrictPreimage_isEmbedding
alias Topology.IsEmbedding.restrictPreimage := Set.restrictPreimage_isEmbedding
@[deprecated (since := "2024-10-26")]
alias Embedding.restrictPreimage := IsEmbedding.restrictPreimage
theorem Set.restrictPreimage_isOpenEmbedding (s : Set β) (h : IsOpenEmbedding f) :
IsOpenEmbedding (s.restrictPreimage f) :=
⟨h.1.restrictPreimage s,
(s.range_restrictPreimage f).symm ▸ continuous_subtype_val.isOpen_preimage _ h.isOpen_range⟩
alias Topology.IsOpenEmbedding.restrictPreimage := Set.restrictPreimage_isOpenEmbedding
theorem Set.restrictPreimage_isClosedEmbedding (s : Set β) (h : IsClosedEmbedding f) :
IsClosedEmbedding (s.restrictPreimage f) :=
⟨h.1.restrictPreimage s,
(s.range_restrictPreimage f).symm ▸ IsInducing.subtypeVal.isClosed_preimage _ h.isClosed_range⟩
alias Topology.IsClosedEmbedding.restrictPreimage := Set.restrictPreimage_isClosedEmbedding
theorem IsClosedMap.restrictPreimage (H : IsClosedMap f) (s : Set β) :
IsClosedMap (s.restrictPreimage f) := by
intro t
suffices ∀ u, IsClosed u → Subtype.val ⁻¹' u = t →
∃ v, IsClosed v ∧ Subtype.val ⁻¹' v = s.restrictPreimage f '' t by
simpa [isClosed_induced_iff]
exact fun u hu e => ⟨f '' u, H u hu, by simp [← e, image_restrictPreimage]⟩
theorem IsOpenMap.restrictPreimage (H : IsOpenMap f) (s : Set β) :
IsOpenMap (s.restrictPreimage f) := by
intro t
suffices ∀ u, IsOpen u → Subtype.val ⁻¹' u = t →
∃ v, IsOpen v ∧ Subtype.val ⁻¹' v = s.restrictPreimage f '' t by
simpa [isOpen_induced_iff]
exact fun u hu e => ⟨f '' u, H u hu, by simp [← e, image_restrictPreimage]⟩
lemma GeneralizingMap.restrictPreimage (H : GeneralizingMap f) (s : Set β) :
GeneralizingMap (s.restrictPreimage f) := by
intro x y h
obtain ⟨a, ha, hy⟩ := H (h.map <| continuous_subtype_val (p := s))
use ⟨a, by simp [hy]⟩
simp [hy, subtype_specializes_iff, ha]
namespace TopologicalSpace.IsOpenCover
section LocalAtTarget
variable {U : ι → Opens β} {s : Set β} (hU : IsOpenCover U)
| include hU
theorem isOpen_iff_inter :
IsOpen s ↔ ∀ i, IsOpen (s ∩ U i) := by
constructor
· exact fun H i ↦ H.inter (U i).isOpen
· intro H
simpa [← inter_iUnion, hU.iSup_set_eq_univ] using isOpen_iUnion H
| Mathlib/Topology/LocalAtTarget.lean | 101 | 108 |
/-
Copyright (c) 2020 Johan Commelin, Robert Y. Lewis. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johan Commelin, Robert Y. Lewis
-/
import Mathlib.Algebra.MvPolynomial.Rename
import Mathlib.Algebra.MvPolynomial.Variables
/-!
# Monad operations on `MvPolynomial`
This file defines two monadic operations on `MvPolynomial`. Given `p : MvPolynomial σ R`,
* `MvPolynomial.bind₁` and `MvPolynomial.join₁` operate on the variable type `σ`.
* `MvPolynomial.bind₂` and `MvPolynomial.join₂` operate on the coefficient type `R`.
- `MvPolynomial.bind₁ f φ` with `f : σ → MvPolynomial τ R` and `φ : MvPolynomial σ R`,
is the polynomial `φ(f 1, ..., f i, ...) : MvPolynomial τ R`.
- `MvPolynomial.join₁ φ` with `φ : MvPolynomial (MvPolynomial σ R) R` collapses `φ` to
a `MvPolynomial σ R`, by evaluating `φ` under the map `X f ↦ f` for `f : MvPolynomial σ R`.
In other words, if you have a polynomial `φ` in a set of variables indexed by a polynomial ring,
you evaluate the polynomial in these indexing polynomials.
- `MvPolynomial.bind₂ f φ` with `f : R →+* MvPolynomial σ S` and `φ : MvPolynomial σ R`
is the `MvPolynomial σ S` obtained from `φ` by mapping the coefficients of `φ` through `f`
and considering the resulting polynomial as polynomial expression in `MvPolynomial σ R`.
- `MvPolynomial.join₂ φ` with `φ : MvPolynomial σ (MvPolynomial σ R)` collapses `φ` to
a `MvPolynomial σ R`, by considering `φ` as polynomial expression in `MvPolynomial σ R`.
These operations themselves have algebraic structure: `MvPolynomial.bind₁`
and `MvPolynomial.join₁` are algebra homs and
`MvPolynomial.bind₂` and `MvPolynomial.join₂` are ring homs.
They interact in convenient ways with `MvPolynomial.rename`, `MvPolynomial.map`,
`MvPolynomial.vars`, and other polynomial operations.
Indeed, `MvPolynomial.rename` is the "map" operation for the (`bind₁`, `join₁`) pair,
whereas `MvPolynomial.map` is the "map" operation for the other pair.
## Implementation notes
We add a `LawfulMonad` instance for the (`bind₁`, `join₁`) pair.
The second pair cannot be instantiated as a `Monad`,
since it is not a monad in `Type` but in `CommRingCat` (or rather `CommSemiRingCat`).
-/
noncomputable section
namespace MvPolynomial
open Finsupp
variable {σ : Type*} {τ : Type*}
variable {R S T : Type*} [CommSemiring R] [CommSemiring S] [CommSemiring T]
/--
`bind₁` is the "left hand side" bind operation on `MvPolynomial`, operating on the variable type.
Given a polynomial `p : MvPolynomial σ R` and a map `f : σ → MvPolynomial τ R` taking variables
in `p` to polynomials in the variable type `τ`, `bind₁ f p` replaces each variable in `p` with
its value under `f`, producing a new polynomial in `τ`. The coefficient type remains the same.
This operation is an algebra hom.
-/
def bind₁ (f : σ → MvPolynomial τ R) : MvPolynomial σ R →ₐ[R] MvPolynomial τ R :=
aeval f
/-- `bind₂` is the "right hand side" bind operation on `MvPolynomial`,
operating on the coefficient type.
Given a polynomial `p : MvPolynomial σ R` and
a map `f : R → MvPolynomial σ S` taking coefficients in `p` to polynomials over a new ring `S`,
`bind₂ f p` replaces each coefficient in `p` with its value under `f`,
producing a new polynomial over `S`.
The variable type remains the same. This operation is a ring hom.
-/
def bind₂ (f : R →+* MvPolynomial σ S) : MvPolynomial σ R →+* MvPolynomial σ S :=
eval₂Hom f X
/--
`join₁` is the monadic join operation corresponding to `MvPolynomial.bind₁`. Given a polynomial `p`
with coefficients in `R` whose variables are polynomials in `σ` with coefficients in `R`,
`join₁ p` collapses `p` to a polynomial with variables in `σ` and coefficients in `R`.
This operation is an algebra hom.
-/
def join₁ : MvPolynomial (MvPolynomial σ R) R →ₐ[R] MvPolynomial σ R :=
aeval id
/--
`join₂` is the monadic join operation corresponding to `MvPolynomial.bind₂`. Given a polynomial `p`
with variables in `σ` whose coefficients are polynomials in `σ` with coefficients in `R`,
`join₂ p` collapses `p` to a polynomial with variables in `σ` and coefficients in `R`.
This operation is a ring hom.
-/
def join₂ : MvPolynomial σ (MvPolynomial σ R) →+* MvPolynomial σ R :=
eval₂Hom (RingHom.id _) X
@[simp]
theorem aeval_eq_bind₁ (f : σ → MvPolynomial τ R) : aeval f = bind₁ f :=
rfl
@[simp]
theorem eval₂Hom_C_eq_bind₁ (f : σ → MvPolynomial τ R) : eval₂Hom C f = bind₁ f :=
rfl
@[simp]
theorem eval₂Hom_eq_bind₂ (f : R →+* MvPolynomial σ S) : eval₂Hom f X = bind₂ f :=
rfl
section
variable (σ R)
@[simp]
theorem aeval_id_eq_join₁ : aeval id = @join₁ σ R _ :=
rfl
theorem eval₂Hom_C_id_eq_join₁ (φ : MvPolynomial (MvPolynomial σ R) R) :
eval₂Hom C id φ = join₁ φ :=
rfl
@[simp]
theorem eval₂Hom_id_X_eq_join₂ : eval₂Hom (RingHom.id _) X = @join₂ σ R _ :=
rfl
end
-- In this file, we don't want to use these simp lemmas,
-- because we first need to show how these new definitions interact
-- and the proofs fall back on unfolding the definitions and call simp afterwards
attribute [-simp]
aeval_eq_bind₁ eval₂Hom_C_eq_bind₁ eval₂Hom_eq_bind₂ aeval_id_eq_join₁ eval₂Hom_id_X_eq_join₂
@[simp]
theorem bind₁_X_right (f : σ → MvPolynomial τ R) (i : σ) : bind₁ f (X i) = f i :=
aeval_X f i
@[simp]
theorem bind₂_X_right (f : R →+* MvPolynomial σ S) (i : σ) : bind₂ f (X i) = X i :=
eval₂Hom_X' f X i
@[simp]
theorem bind₁_X_left : bind₁ (X : σ → MvPolynomial σ R) = AlgHom.id R _ := by
ext1 i
simp
variable (f : σ → MvPolynomial τ R)
theorem bind₁_C_right (f : σ → MvPolynomial τ R) (x) : bind₁ f (C x) = C x := algHom_C _ _
@[simp]
theorem bind₂_C_right (f : R →+* MvPolynomial σ S) (r : R) : bind₂ f (C r) = f r :=
eval₂Hom_C f X r
@[simp]
theorem bind₂_C_left : bind₂ (C : R →+* MvPolynomial σ R) = RingHom.id _ := by ext : 2 <;> simp
@[simp]
theorem bind₂_comp_C (f : R →+* MvPolynomial σ S) : (bind₂ f).comp C = f :=
RingHom.ext <| bind₂_C_right _
@[simp]
theorem join₂_map (f : R →+* MvPolynomial σ S) (φ : MvPolynomial σ R) :
join₂ (map f φ) = bind₂ f φ := by simp only [join₂, bind₂, eval₂Hom_map_hom, RingHom.id_comp]
@[simp]
theorem join₂_comp_map (f : R →+* MvPolynomial σ S) : join₂.comp (map f) = bind₂ f :=
RingHom.ext <| join₂_map _
theorem aeval_id_rename (f : σ → MvPolynomial τ R) (p : MvPolynomial σ R) :
aeval id (rename f p) = aeval f p := by rw [aeval_rename, Function.id_comp]
@[simp]
theorem join₁_rename (f : σ → MvPolynomial τ R) (φ : MvPolynomial σ R) :
join₁ (rename f φ) = bind₁ f φ :=
aeval_id_rename _ _
@[simp]
theorem bind₁_id : bind₁ (@id (MvPolynomial σ R)) = join₁ :=
rfl
@[simp]
theorem bind₂_id : bind₂ (RingHom.id (MvPolynomial σ R)) = join₂ :=
rfl
theorem bind₁_bind₁ {υ : Type*} (f : σ → MvPolynomial τ R) (g : τ → MvPolynomial υ R)
(φ : MvPolynomial σ R) : (bind₁ g) (bind₁ f φ) = bind₁ (fun i => bind₁ g (f i)) φ := by
simp [bind₁, ← comp_aeval]
theorem bind₁_comp_bind₁ {υ : Type*} (f : σ → MvPolynomial τ R) (g : τ → MvPolynomial υ R) :
(bind₁ g).comp (bind₁ f) = bind₁ fun i => bind₁ g (f i) := by
ext1
apply bind₁_bind₁
theorem bind₂_comp_bind₂ (f : R →+* MvPolynomial σ S) (g : S →+* MvPolynomial σ T) :
(bind₂ g).comp (bind₂ f) = bind₂ ((bind₂ g).comp f) := by ext : 2 <;> simp
theorem bind₂_bind₂ (f : R →+* MvPolynomial σ S) (g : S →+* MvPolynomial σ T)
(φ : MvPolynomial σ R) : (bind₂ g) (bind₂ f φ) = bind₂ ((bind₂ g).comp f) φ :=
RingHom.congr_fun (bind₂_comp_bind₂ f g) φ
theorem rename_comp_bind₁ {υ : Type*} (f : σ → MvPolynomial τ R) (g : τ → υ) :
(rename g).comp (bind₁ f) = bind₁ fun i => rename g <| f i := by
ext1 i
simp
theorem rename_bind₁ {υ : Type*} (f : σ → MvPolynomial τ R) (g : τ → υ) (φ : MvPolynomial σ R) :
rename g (bind₁ f φ) = bind₁ (fun i => rename g <| f i) φ :=
AlgHom.congr_fun (rename_comp_bind₁ f g) φ
theorem map_bind₂ (f : R →+* MvPolynomial σ S) (g : S →+* T) (φ : MvPolynomial σ R) :
map g (bind₂ f φ) = bind₂ ((map g).comp f) φ := by
simp only [bind₂, eval₂_comp_right, coe_eval₂Hom, eval₂_map]
congr 1 with : 1
simp only [Function.comp_apply, map_X]
theorem bind₁_comp_rename {υ : Type*} (f : τ → MvPolynomial υ R) (g : σ → τ) :
(bind₁ f).comp (rename g) = bind₁ (f ∘ g) := by
ext1 i
simp
theorem bind₁_rename {υ : Type*} (f : τ → MvPolynomial υ R) (g : σ → τ) (φ : MvPolynomial σ R) :
bind₁ f (rename g φ) = bind₁ (f ∘ g) φ :=
AlgHom.congr_fun (bind₁_comp_rename f g) φ
theorem bind₂_map (f : S →+* MvPolynomial σ T) (g : R →+* S) (φ : MvPolynomial σ R) :
bind₂ f (map g φ) = bind₂ (f.comp g) φ := by simp [bind₂]
@[simp]
theorem map_comp_C (f : R →+* S) : (map f).comp (C : R →+* MvPolynomial σ R) = C.comp f := by
ext1
apply map_C
-- mixing the two monad structures
theorem hom_bind₁ (f : MvPolynomial τ R →+* S) (g : σ → MvPolynomial τ R) (φ : MvPolynomial σ R) :
f (bind₁ g φ) = eval₂Hom (f.comp C) (fun i => f (g i)) φ := by
rw [bind₁, map_aeval, algebraMap_eq]
theorem map_bind₁ (f : R →+* S) (g : σ → MvPolynomial τ R) (φ : MvPolynomial σ R) :
map f (bind₁ g φ) = bind₁ (fun i : σ => (map f) (g i)) (map f φ) := by
rw [hom_bind₁, map_comp_C, ← eval₂Hom_map_hom]
rfl
@[simp]
theorem eval₂Hom_comp_C (f : R →+* S) (g : σ → S) : (eval₂Hom f g).comp C = f := by
ext1 r
exact eval₂_C f g r
theorem eval₂Hom_bind₁ (f : R →+* S) (g : τ → S) (h : σ → MvPolynomial τ R) (φ : MvPolynomial σ R) :
eval₂Hom f g (bind₁ h φ) = eval₂Hom f (fun i => eval₂Hom f g (h i)) φ := by
rw [hom_bind₁, eval₂Hom_comp_C]
theorem aeval_bind₁ [Algebra R S] (f : τ → S) (g : σ → MvPolynomial τ R) (φ : MvPolynomial σ R) :
aeval f (bind₁ g φ) = aeval (fun i => aeval f (g i)) φ :=
eval₂Hom_bind₁ _ _ _ _
theorem aeval_comp_bind₁ [Algebra R S] (f : τ → S) (g : σ → MvPolynomial τ R) :
(aeval f).comp (bind₁ g) = aeval fun i => aeval f (g i) := by
ext1
apply aeval_bind₁
theorem eval₂Hom_comp_bind₂ (f : S →+* T) (g : σ → T) (h : R →+* MvPolynomial σ S) :
(eval₂Hom f g).comp (bind₂ h) = eval₂Hom ((eval₂Hom f g).comp h) g := by ext : 2 <;> simp
theorem eval₂Hom_bind₂ (f : S →+* T) (g : σ → T) (h : R →+* MvPolynomial σ S)
(φ : MvPolynomial σ R) : eval₂Hom f g (bind₂ h φ) = eval₂Hom ((eval₂Hom f g).comp h) g φ :=
RingHom.congr_fun (eval₂Hom_comp_bind₂ f g h) φ
theorem aeval_bind₂ [Algebra S T] (f : σ → T) (g : R →+* MvPolynomial σ S) (φ : MvPolynomial σ R) :
aeval f (bind₂ g φ) = eval₂Hom ((↑(aeval f : _ →ₐ[S] _) : _ →+* _).comp g) f φ :=
eval₂Hom_bind₂ _ _ _ _
alias eval₂Hom_C_left := eval₂Hom_C_eq_bind₁
theorem bind₁_monomial (f : σ → MvPolynomial τ R) (d : σ →₀ ℕ) (r : R) :
bind₁ f (monomial d r) = C r * ∏ i ∈ d.support, f i ^ d i := by
simp only [monomial_eq, map_mul, bind₁_C_right, Finsupp.prod, map_prod,
map_pow, bind₁_X_right]
theorem bind₂_monomial (f : R →+* MvPolynomial σ S) (d : σ →₀ ℕ) (r : R) :
bind₂ f (monomial d r) = f r * monomial d 1 := by
simp only [monomial_eq, RingHom.map_mul, bind₂_C_right, Finsupp.prod, map_prod,
map_pow, bind₂_X_right, C_1, one_mul]
@[simp]
theorem bind₂_monomial_one (f : R →+* MvPolynomial σ S) (d : σ →₀ ℕ) :
bind₂ f (monomial d 1) = monomial d 1 := by rw [bind₂_monomial, f.map_one, one_mul]
section
theorem vars_bind₁ [DecidableEq τ] (f : σ → MvPolynomial τ R) (φ : MvPolynomial σ R) :
(bind₁ f φ).vars ⊆ φ.vars.biUnion fun i => (f i).vars := by
calc (bind₁ f φ).vars
_ = (φ.support.sum fun x : σ →₀ ℕ => (bind₁ f) (monomial x (coeff x φ))).vars := by
rw [← map_sum, ← φ.as_sum]
_ ≤ φ.support.biUnion fun i : σ →₀ ℕ => ((bind₁ f) (monomial i (coeff i φ))).vars :=
(vars_sum_subset _ _)
_ = φ.support.biUnion fun d : σ →₀ ℕ => vars (C (coeff d φ) * ∏ i ∈ d.support, f i ^ d i) := by
simp only [bind₁_monomial]
_ ≤ φ.support.biUnion fun d : σ →₀ ℕ => d.support.biUnion fun i => vars (f i) := ?_
-- proof below
_ ≤ φ.vars.biUnion fun i : σ => vars (f i) := ?_
-- proof below
· apply Finset.biUnion_mono
intro d _hd
calc
vars (C (coeff d φ) * ∏ i ∈ d.support, f i ^ d i) ≤
(C (coeff d φ)).vars ∪ (∏ i ∈ d.support, f i ^ d i).vars :=
vars_mul _ _
_ ≤ (∏ i ∈ d.support, f i ^ d i).vars := by
simp only [Finset.empty_union, vars_C, Finset.le_iff_subset, Finset.Subset.refl]
_ ≤ d.support.biUnion fun i : σ => vars (f i ^ d i) := vars_prod _
_ ≤ d.support.biUnion fun i : σ => (f i).vars := ?_
apply Finset.biUnion_mono
intro i _hi
apply vars_pow
· intro j
simp_rw [Finset.mem_biUnion]
rintro ⟨d, hd, ⟨i, hi, hj⟩⟩
exact ⟨i, (mem_vars _).mpr ⟨d, hd, hi⟩, hj⟩
end
theorem mem_vars_bind₁ (f : σ → MvPolynomial τ R) (φ : MvPolynomial σ R) {j : τ}
(h : j ∈ (bind₁ f φ).vars) : ∃ i : σ, i ∈ φ.vars ∧ j ∈ (f i).vars := by
classical
simpa only [exists_prop, Finset.mem_biUnion, mem_support_iff, Ne] using vars_bind₁ f φ h
instance monad : Monad fun σ => MvPolynomial σ R where
map f p := rename f p
pure := X
bind p f := bind₁ f p
instance lawfulFunctor : LawfulFunctor fun σ => MvPolynomial σ R where
map_const := by intros; rfl
-- Porting note: I guess `map_const` no longer has a default implementation?
id_map := by intros; simp [(· <$> ·)]
comp_map := by intros; simp [(· <$> ·)]
instance lawfulMonad : LawfulMonad fun σ => MvPolynomial σ R where
| pure_bind := by intros; simp [pure, bind]
bind_assoc := by intros; simp [bind, ← bind₁_comp_bind₁]
seqLeft_eq := by intros; simp [SeqLeft.seqLeft, Seq.seq, (· <$> ·), bind₁_rename]; rfl
seqRight_eq := by intros; simp [SeqRight.seqRight, Seq.seq, (· <$> ·), bind₁_rename]; rfl
| Mathlib/Algebra/MvPolynomial/Monad.lean | 339 | 342 |
/-
Copyright (c) 2014 Jeremy Avigad. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Jeremy Avigad, Mario Carneiro
-/
import Mathlib.Data.Subtype
import Mathlib.Order.Defs.LinearOrder
import Mathlib.Order.Notation
import Mathlib.Tactic.GCongr.Core
import Mathlib.Tactic.Spread
import Mathlib.Tactic.Convert
import Mathlib.Tactic.Inhabit
import Mathlib.Tactic.SimpRw
/-!
# Basic definitions about `≤` and `<`
This file proves basic results about orders, provides extensive dot notation, defines useful order
classes and allows to transfer order instances.
## Type synonyms
* `OrderDual α` : A type synonym reversing the meaning of all inequalities, with notation `αᵒᵈ`.
* `AsLinearOrder α`: A type synonym to promote `PartialOrder α` to `LinearOrder α` using
`IsTotal α (≤)`.
### Transferring orders
- `Order.Preimage`, `Preorder.lift`: Transfers a (pre)order on `β` to an order on `α`
using a function `f : α → β`.
- `PartialOrder.lift`, `LinearOrder.lift`: Transfers a partial (resp., linear) order on `β` to a
partial (resp., linear) order on `α` using an injective function `f`.
### Extra class
* `DenselyOrdered`: An order with no gap, i.e. for any two elements `a < b` there exists `c` such
that `a < c < b`.
## Notes
`≤` and `<` are highly favored over `≥` and `>` in mathlib. The reason is that we can formulate all
lemmas using `≤`/`<`, and `rw` has trouble unifying `≤` and `≥`. Hence choosing one direction spares
us useless duplication. This is enforced by a linter. See Note [nolint_ge] for more infos.
Dot notation is particularly useful on `≤` (`LE.le`) and `<` (`LT.lt`). To that end, we
provide many aliases to dot notation-less lemmas. For example, `le_trans` is aliased with
`LE.le.trans` and can be used to construct `hab.trans hbc : a ≤ c` when `hab : a ≤ b`,
`hbc : b ≤ c`, `lt_of_le_of_lt` is aliased as `LE.le.trans_lt` and can be used to construct
`hab.trans hbc : a < c` when `hab : a ≤ b`, `hbc : b < c`.
## TODO
- expand module docs
- automatic construction of dual definitions / theorems
## Tags
preorder, order, partial order, poset, linear order, chain
-/
open Function
variable {ι α β : Type*} {π : ι → Type*}
/-! ### Bare relations -/
attribute [ext] LE
protected lemma LE.le.ge [LE α] {x y : α} (h : x ≤ y) : y ≥ x := h
protected lemma GE.ge.le [LE α] {x y : α} (h : x ≥ y) : y ≤ x := h
protected lemma LT.lt.gt [LT α] {x y : α} (h : x < y) : y > x := h
protected lemma GT.gt.lt [LT α] {x y : α} (h : x > y) : y < x := h
/-- Given a relation `R` on `β` and a function `f : α → β`, the preimage relation on `α` is defined
by `x ≤ y ↔ f x ≤ f y`. It is the unique relation on `α` making `f` a `RelEmbedding` (assuming `f`
is injective). -/
@[simp]
def Order.Preimage (f : α → β) (s : β → β → Prop) (x y : α) : Prop := s (f x) (f y)
@[inherit_doc] infixl:80 " ⁻¹'o " => Order.Preimage
/-- The preimage of a decidable order is decidable. -/
instance Order.Preimage.decidable (f : α → β) (s : β → β → Prop) [H : DecidableRel s] :
DecidableRel (f ⁻¹'o s) := fun _ _ ↦ H _ _
/-! ### Preorders -/
section Preorder
variable [Preorder α] {a b c d : α}
theorem le_trans' : b ≤ c → a ≤ b → a ≤ c :=
flip le_trans
theorem lt_trans' : b < c → a < b → a < c :=
flip lt_trans
theorem lt_of_le_of_lt' : b ≤ c → a < b → a < c :=
flip lt_of_lt_of_le
theorem lt_of_lt_of_le' : b < c → a ≤ b → a < c :=
flip lt_of_le_of_lt
theorem le_of_le_of_eq' : b ≤ c → a = b → a ≤ c :=
flip le_of_eq_of_le
theorem le_of_eq_of_le' : b = c → a ≤ b → a ≤ c :=
flip le_of_le_of_eq
theorem lt_of_lt_of_eq' : b < c → a = b → a < c :=
flip lt_of_eq_of_lt
theorem lt_of_eq_of_lt' : b = c → a < b → a < c :=
flip lt_of_lt_of_eq
theorem not_lt_iff_not_le_or_ge : ¬a < b ↔ ¬a ≤ b ∨ b ≤ a := by
rw [lt_iff_le_not_le, Classical.not_and_iff_not_or_not, Classical.not_not]
-- Unnecessary brackets are here for readability
lemma not_lt_iff_le_imp_le : ¬ a < b ↔ (a ≤ b → b ≤ a) := by
simp [not_lt_iff_not_le_or_ge, or_iff_not_imp_left]
/-- If `x = y` then `y ≤ x`. Note: this lemma uses `y ≤ x` instead of `x ≥ y`, because `le` is used
almost exclusively in mathlib. -/
lemma ge_of_eq (h : a = b) : b ≤ a := le_of_eq h.symm
@[simp] lemma lt_self_iff_false (x : α) : x < x ↔ False := ⟨lt_irrefl x, False.elim⟩
alias LE.le.trans := le_trans
alias LE.le.trans' := le_trans'
alias LT.lt.trans := lt_trans
alias LT.lt.trans' := lt_trans'
alias LE.le.trans_lt := lt_of_le_of_lt
alias LE.le.trans_lt' := lt_of_le_of_lt'
alias LT.lt.trans_le := lt_of_lt_of_le
alias LT.lt.trans_le' := lt_of_lt_of_le'
alias LE.le.trans_eq := le_of_le_of_eq
alias LE.le.trans_eq' := le_of_le_of_eq'
alias LT.lt.trans_eq := lt_of_lt_of_eq
alias LT.lt.trans_eq' := lt_of_lt_of_eq'
alias Eq.trans_le := le_of_eq_of_le
alias Eq.trans_ge := le_of_eq_of_le'
alias Eq.trans_lt := lt_of_eq_of_lt
alias Eq.trans_gt := lt_of_eq_of_lt'
alias LE.le.lt_of_not_le := lt_of_le_not_le
alias LE.le.lt_or_eq_dec := Decidable.lt_or_eq_of_le
alias LT.lt.le := le_of_lt
alias LT.lt.ne := ne_of_lt
alias Eq.le := le_of_eq
@[inherit_doc ge_of_eq] alias Eq.ge := ge_of_eq
alias LT.lt.asymm := lt_asymm
alias LT.lt.not_lt := lt_asymm
theorem ne_of_not_le (h : ¬a ≤ b) : a ≠ b := fun hab ↦ h (le_of_eq hab)
protected lemma Eq.not_lt (hab : a = b) : ¬a < b := fun h' ↦ h'.ne hab
protected lemma Eq.not_gt (hab : a = b) : ¬b < a := hab.symm.not_lt
@[simp] lemma le_of_subsingleton [Subsingleton α] : a ≤ b := (Subsingleton.elim a b).le
-- Making this a @[simp] lemma causes confluence problems downstream.
lemma not_lt_of_subsingleton [Subsingleton α] : ¬a < b := (Subsingleton.elim a b).not_lt
namespace LT.lt
protected theorem false : a < a → False := lt_irrefl a
theorem ne' (h : a < b) : b ≠ a := h.ne.symm
end LT.lt
theorem le_of_forall_le (H : ∀ c, c ≤ a → c ≤ b) : a ≤ b := H _ le_rfl
theorem le_of_forall_ge (H : ∀ c, a ≤ c → b ≤ c) : b ≤ a := H _ le_rfl
@[deprecated (since := "2025-01-30")] alias le_of_forall_le' := le_of_forall_ge
theorem forall_le_iff_le : (∀ ⦃c⦄, c ≤ a → c ≤ b) ↔ a ≤ b :=
⟨le_of_forall_le, fun h _ hca ↦ le_trans hca h⟩
theorem forall_le_iff_ge : (∀ ⦃c⦄, a ≤ c → b ≤ c) ↔ b ≤ a :=
⟨le_of_forall_ge, fun h _ hca ↦ le_trans h hca⟩
/-- monotonicity of `≤` with respect to `→` -/
theorem le_implies_le_of_le_of_le (hca : c ≤ a) (hbd : b ≤ d) : a ≤ b → c ≤ d :=
fun hab ↦ (hca.trans hab).trans hbd
end Preorder
/-! ### Partial order -/
section PartialOrder
variable [PartialOrder α] {a b : α}
theorem ge_antisymm : a ≤ b → b ≤ a → b = a :=
flip le_antisymm
theorem lt_of_le_of_ne' : a ≤ b → b ≠ a → a < b := fun h₁ h₂ ↦ lt_of_le_of_ne h₁ h₂.symm
theorem Ne.lt_of_le : a ≠ b → a ≤ b → a < b :=
flip lt_of_le_of_ne
theorem Ne.lt_of_le' : b ≠ a → a ≤ b → a < b :=
flip lt_of_le_of_ne'
alias LE.le.antisymm := le_antisymm
alias LE.le.antisymm' := ge_antisymm
alias LE.le.lt_of_ne := lt_of_le_of_ne
alias LE.le.lt_of_ne' := lt_of_le_of_ne'
alias LE.le.lt_or_eq := lt_or_eq_of_le
-- Unnecessary brackets are here for readability
lemma le_imp_eq_iff_le_imp_le : (a ≤ b → b = a) ↔ (a ≤ b → b ≤ a) where
mp h hab := (h hab).le
mpr h hab := (h hab).antisymm hab
-- Unnecessary brackets are here for readability
lemma ge_imp_eq_iff_le_imp_le : (a ≤ b → a = b) ↔ (a ≤ b → b ≤ a) where
mp h hab := (h hab).ge
mpr h hab := hab.antisymm (h hab)
namespace LE.le
theorem lt_iff_ne (h : a ≤ b) : a < b ↔ a ≠ b :=
⟨fun h ↦ h.ne, h.lt_of_ne⟩
theorem gt_iff_ne (h : a ≤ b) : a < b ↔ b ≠ a :=
⟨fun h ↦ h.ne.symm, h.lt_of_ne'⟩
theorem not_lt_iff_eq (h : a ≤ b) : ¬a < b ↔ a = b :=
h.lt_iff_ne.not_left
theorem not_gt_iff_eq (h : a ≤ b) : ¬a < b ↔ b = a :=
h.gt_iff_ne.not_left
theorem le_iff_eq (h : a ≤ b) : b ≤ a ↔ b = a :=
⟨fun h' ↦ h'.antisymm h, Eq.le⟩
theorem ge_iff_eq (h : a ≤ b) : b ≤ a ↔ a = b :=
⟨h.antisymm, Eq.ge⟩
end LE.le
-- See Note [decidable namespace]
protected theorem Decidable.le_iff_eq_or_lt [DecidableLE α] : a ≤ b ↔ a = b ∨ a < b :=
Decidable.le_iff_lt_or_eq.trans or_comm
theorem le_iff_eq_or_lt : a ≤ b ↔ a = b ∨ a < b := le_iff_lt_or_eq.trans or_comm
theorem lt_iff_le_and_ne : a < b ↔ a ≤ b ∧ a ≠ b :=
⟨fun h ↦ ⟨le_of_lt h, ne_of_lt h⟩, fun ⟨h1, h2⟩ ↦ h1.lt_of_ne h2⟩
lemma eq_iff_not_lt_of_le (hab : a ≤ b) : a = b ↔ ¬ a < b := by simp [hab, lt_iff_le_and_ne]
alias LE.le.eq_iff_not_lt := eq_iff_not_lt_of_le
-- See Note [decidable namespace]
protected theorem Decidable.eq_iff_le_not_lt [DecidableLE α] : a = b ↔ a ≤ b ∧ ¬a < b :=
⟨fun h ↦ ⟨h.le, h ▸ lt_irrefl _⟩, fun ⟨h₁, h₂⟩ ↦
h₁.antisymm <| Decidable.byContradiction fun h₃ ↦ h₂ (h₁.lt_of_not_le h₃)⟩
theorem eq_iff_le_not_lt : a = b ↔ a ≤ b ∧ ¬a < b :=
haveI := Classical.dec
Decidable.eq_iff_le_not_lt
theorem eq_or_lt_of_le (h : a ≤ b) : a = b ∨ a < b := h.lt_or_eq.symm
theorem eq_or_gt_of_le (h : a ≤ b) : b = a ∨ a < b := h.lt_or_eq.symm.imp Eq.symm id
theorem gt_or_eq_of_le (h : a ≤ b) : a < b ∨ b = a := (eq_or_gt_of_le h).symm
alias LE.le.eq_or_lt_dec := Decidable.eq_or_lt_of_le
alias LE.le.eq_or_lt := eq_or_lt_of_le
alias LE.le.eq_or_gt := eq_or_gt_of_le
alias LE.le.gt_or_eq := gt_or_eq_of_le
theorem eq_of_le_of_not_lt (hab : a ≤ b) (hba : ¬a < b) : a = b := hab.eq_or_lt.resolve_right hba
theorem eq_of_ge_of_not_gt (hab : a ≤ b) (hba : ¬a < b) : b = a := (eq_of_le_of_not_lt hab hba).symm
alias LE.le.eq_of_not_lt := eq_of_le_of_not_lt
alias LE.le.eq_of_not_gt := eq_of_ge_of_not_gt
theorem Ne.le_iff_lt (h : a ≠ b) : a ≤ b ↔ a < b := ⟨fun h' ↦ lt_of_le_of_ne h' h, fun h ↦ h.le⟩
theorem Ne.not_le_or_not_le (h : a ≠ b) : ¬a ≤ b ∨ ¬b ≤ a := not_and_or.1 <| le_antisymm_iff.not.1 h
-- See Note [decidable namespace]
protected theorem Decidable.ne_iff_lt_iff_le [DecidableEq α] : (a ≠ b ↔ a < b) ↔ a ≤ b :=
⟨fun h ↦ Decidable.byCases le_of_eq (le_of_lt ∘ h.mp), fun h ↦ ⟨lt_of_le_of_ne h, ne_of_lt⟩⟩
@[simp]
theorem ne_iff_lt_iff_le : (a ≠ b ↔ a < b) ↔ a ≤ b :=
haveI := Classical.dec
Decidable.ne_iff_lt_iff_le
lemma eq_of_forall_le_iff (H : ∀ c, c ≤ a ↔ c ≤ b) : a = b :=
((H _).1 le_rfl).antisymm ((H _).2 le_rfl)
lemma eq_of_forall_ge_iff (H : ∀ c, a ≤ c ↔ b ≤ c) : a = b :=
((H _).2 le_rfl).antisymm ((H _).1 le_rfl)
/-- To prove commutativity of a binary operation `○`, we only to check `a ○ b ≤ b ○ a` for all `a`,
`b`. -/
lemma commutative_of_le {f : β → β → α} (comm : ∀ a b, f a b ≤ f b a) : ∀ a b, f a b = f b a :=
fun _ _ ↦ (comm _ _).antisymm <| comm _ _
/-- To prove associativity of a commutative binary operation `○`, we only to check
`(a ○ b) ○ c ≤ a ○ (b ○ c)` for all `a`, `b`, `c`. -/
lemma associative_of_commutative_of_le {f : α → α → α} (comm : Std.Commutative f)
(assoc : ∀ a b c, f (f a b) c ≤ f a (f b c)) : Std.Associative f where
assoc a b c :=
le_antisymm (assoc _ _ _) <| by
rw [comm.comm, comm.comm b, comm.comm _ c, comm.comm a]
exact assoc ..
end PartialOrder
section LinearOrder
variable [LinearOrder α] {a b : α}
namespace LE.le
lemma lt_or_le (h : a ≤ b) (c : α) : a < c ∨ c ≤ b := (lt_or_ge a c).imp id h.trans'
lemma le_or_lt (h : a ≤ b) (c : α) : a ≤ c ∨ c < b := (le_or_gt a c).imp id h.trans_lt'
lemma le_or_le (h : a ≤ b) (c : α) : a ≤ c ∨ c ≤ b := (h.lt_or_le c).imp le_of_lt id
end LE.le
namespace LT.lt
lemma lt_or_lt (h : a < b) (c : α) : a < c ∨ c < b := (le_or_gt b c).imp h.trans_le id
end LT.lt
-- Variant of `min_def` with the branches reversed.
theorem min_def' (a b : α) : min a b = if b ≤ a then b else a := by
rw [min_def]
rcases lt_trichotomy a b with (lt | eq | gt)
· rw [if_pos lt.le, if_neg (not_le.mpr lt)]
· rw [if_pos eq.le, if_pos eq.ge, eq]
· rw [if_neg (not_le.mpr gt.gt), if_pos gt.le]
-- Variant of `min_def` with the branches reversed.
-- This is sometimes useful as it used to be the default.
theorem max_def' (a b : α) : max a b = if b ≤ a then a else b := by
rw [max_def]
rcases lt_trichotomy a b with (lt | eq | gt)
· rw [if_pos lt.le, if_neg (not_le.mpr lt)]
· rw [if_pos eq.le, if_pos eq.ge, eq]
· rw [if_neg (not_le.mpr gt.gt), if_pos gt.le]
theorem lt_of_not_le (h : ¬b ≤ a) : a < b :=
((le_total _ _).resolve_right h).lt_of_not_le h
theorem lt_iff_not_le : a < b ↔ ¬b ≤ a :=
⟨not_le_of_lt, lt_of_not_le⟩
theorem Ne.lt_or_lt (h : a ≠ b) : a < b ∨ b < a :=
lt_or_gt_of_ne h
/-- A version of `ne_iff_lt_or_gt` with LHS and RHS reversed. -/
@[simp]
theorem lt_or_lt_iff_ne : a < b ∨ b < a ↔ a ≠ b :=
ne_iff_lt_or_gt.symm
theorem not_lt_iff_eq_or_lt : ¬a < b ↔ a = b ∨ b < a :=
not_lt.trans <| Decidable.le_iff_eq_or_lt.trans <| or_congr eq_comm Iff.rfl
theorem exists_ge_of_linear (a b : α) : ∃ c, a ≤ c ∧ b ≤ c :=
match le_total a b with
| Or.inl h => ⟨_, h, le_rfl⟩
| Or.inr h => ⟨_, le_rfl, h⟩
lemma exists_forall_ge_and {p q : α → Prop} :
(∃ i, ∀ j ≥ i, p j) → (∃ i, ∀ j ≥ i, q j) → ∃ i, ∀ j ≥ i, p j ∧ q j
| ⟨a, ha⟩, ⟨b, hb⟩ =>
let ⟨c, hac, hbc⟩ := exists_ge_of_linear a b
⟨c, fun _d hcd ↦ ⟨ha _ <| hac.trans hcd, hb _ <| hbc.trans hcd⟩⟩
theorem le_of_forall_lt (H : ∀ c, c < a → c < b) : a ≤ b :=
le_of_not_lt fun h ↦ lt_irrefl _ (H _ h)
theorem forall_lt_iff_le : (∀ ⦃c⦄, c < a → c < b) ↔ a ≤ b :=
⟨le_of_forall_lt, fun h _ hca ↦ lt_of_lt_of_le hca h⟩
theorem le_of_forall_lt' (H : ∀ c, a < c → b < c) : b ≤ a :=
le_of_not_lt fun h ↦ lt_irrefl _ (H _ h)
theorem forall_lt_iff_le' : (∀ ⦃c⦄, a < c → b < c) ↔ b ≤ a :=
⟨le_of_forall_lt', fun h _ hac ↦ lt_of_le_of_lt h hac⟩
theorem eq_of_forall_lt_iff (h : ∀ c, c < a ↔ c < b) : a = b :=
(le_of_forall_lt fun _ ↦ (h _).1).antisymm <| le_of_forall_lt fun _ ↦ (h _).2
theorem eq_of_forall_gt_iff (h : ∀ c, a < c ↔ b < c) : a = b :=
(le_of_forall_lt' fun _ ↦ (h _).2).antisymm <| le_of_forall_lt' fun _ ↦ (h _).1
section ltByCases
variable {P : Sort*} {x y : α}
@[simp]
lemma ltByCases_lt (h : x < y) {h₁ : x < y → P} {h₂ : x = y → P} {h₃ : y < x → P} :
ltByCases x y h₁ h₂ h₃ = h₁ h := dif_pos h
@[simp]
lemma ltByCases_gt (h : y < x) {h₁ : x < y → P} {h₂ : x = y → P} {h₃ : y < x → P} :
ltByCases x y h₁ h₂ h₃ = h₃ h := (dif_neg h.not_lt).trans (dif_pos h)
@[simp]
lemma ltByCases_eq (h : x = y) {h₁ : x < y → P} {h₂ : x = y → P} {h₃ : y < x → P} :
ltByCases x y h₁ h₂ h₃ = h₂ h := (dif_neg h.not_lt).trans (dif_neg h.not_gt)
lemma ltByCases_not_lt (h : ¬ x < y) {h₁ : x < y → P} {h₂ : x = y → P} {h₃ : y < x → P}
(p : ¬ y < x → x = y := fun h' => (le_antisymm (le_of_not_gt h') (le_of_not_gt h))) :
ltByCases x y h₁ h₂ h₃ = if h' : y < x then h₃ h' else h₂ (p h') := dif_neg h
lemma ltByCases_not_gt (h : ¬ y < x) {h₁ : x < y → P} {h₂ : x = y → P} {h₃ : y < x → P}
(p : ¬ x < y → x = y := fun h' => (le_antisymm (le_of_not_gt h) (le_of_not_gt h'))) :
ltByCases x y h₁ h₂ h₃ = if h' : x < y then h₁ h' else h₂ (p h') :=
dite_congr rfl (fun _ => rfl) (fun _ => dif_neg h)
lemma ltByCases_ne (h : x ≠ y) {h₁ : x < y → P} {h₂ : x = y → P} {h₃ : y < x → P}
(p : ¬ x < y → y < x := fun h' => h.lt_or_lt.resolve_left h') :
ltByCases x y h₁ h₂ h₃ = if h' : x < y then h₁ h' else h₃ (p h') :=
dite_congr rfl (fun _ => rfl) (fun _ => dif_pos _)
lemma ltByCases_comm {h₁ : x < y → P} {h₂ : x = y → P} {h₃ : y < x → P}
(p : y = x → x = y := fun h' => h'.symm) :
ltByCases x y h₁ h₂ h₃ = ltByCases y x h₃ (h₂ ∘ p) h₁ := by
refine ltByCases x y (fun h => ?_) (fun h => ?_) (fun h => ?_)
· rw [ltByCases_lt h, ltByCases_gt h]
· rw [ltByCases_eq h, ltByCases_eq h.symm, comp_apply]
· rw [ltByCases_lt h, ltByCases_gt h]
lemma eq_iff_eq_of_lt_iff_lt_of_gt_iff_gt {x' y' : α}
(ltc : (x < y) ↔ (x' < y')) (gtc : (y < x) ↔ (y' < x')) :
x = y ↔ x' = y' := by simp_rw [eq_iff_le_not_lt, ← not_lt, ltc, gtc]
lemma ltByCases_rec {h₁ : x < y → P} {h₂ : x = y → P} {h₃ : y < x → P} (p : P)
(hlt : (h : x < y) → h₁ h = p) (heq : (h : x = y) → h₂ h = p)
(hgt : (h : y < x) → h₃ h = p) :
ltByCases x y h₁ h₂ h₃ = p :=
ltByCases x y
(fun h => ltByCases_lt h ▸ hlt h)
(fun h => ltByCases_eq h ▸ heq h)
(fun h => ltByCases_gt h ▸ hgt h)
lemma ltByCases_eq_iff {h₁ : x < y → P} {h₂ : x = y → P} {h₃ : y < x → P} {p : P} :
ltByCases x y h₁ h₂ h₃ = p ↔ (∃ h, h₁ h = p) ∨ (∃ h, h₂ h = p) ∨ (∃ h, h₃ h = p) := by
refine ltByCases x y (fun h => ?_) (fun h => ?_) (fun h => ?_)
· simp only [ltByCases_lt, exists_prop_of_true, h, h.not_lt, not_false_eq_true,
exists_prop_of_false, or_false, h.ne]
· simp only [h, lt_self_iff_false, ltByCases_eq, not_false_eq_true,
exists_prop_of_false, exists_prop_of_true, or_false, false_or]
· simp only [ltByCases_gt, exists_prop_of_true, h, h.not_lt, not_false_eq_true,
exists_prop_of_false, false_or, h.ne']
lemma ltByCases_congr {x' y' : α} {h₁ : x < y → P} {h₂ : x = y → P} {h₃ : y < x → P}
{h₁' : x' < y' → P} {h₂' : x' = y' → P} {h₃' : y' < x' → P} (ltc : (x < y) ↔ (x' < y'))
(gtc : (y < x) ↔ (y' < x')) (hh'₁ : ∀ (h : x' < y'), h₁ (ltc.mpr h) = h₁' h)
(hh'₂ : ∀ (h : x' = y'), h₂ ((eq_iff_eq_of_lt_iff_lt_of_gt_iff_gt ltc gtc).mpr h) = h₂' h)
(hh'₃ : ∀ (h : y' < x'), h₃ (gtc.mpr h) = h₃' h) :
ltByCases x y h₁ h₂ h₃ = ltByCases x' y' h₁' h₂' h₃' := by
refine ltByCases_rec _ (fun h => ?_) (fun h => ?_) (fun h => ?_)
· rw [ltByCases_lt (ltc.mp h), hh'₁]
· rw [eq_iff_eq_of_lt_iff_lt_of_gt_iff_gt ltc gtc] at h
rw [ltByCases_eq h, hh'₂]
· rw [ltByCases_gt (gtc.mp h), hh'₃]
/-- Perform a case-split on the ordering of `x` and `y` in a decidable linear order,
non-dependently. -/
abbrev ltTrichotomy (x y : α) (p q r : P) := ltByCases x y (fun _ => p) (fun _ => q) (fun _ => r)
variable {p q r s : P}
@[simp]
lemma ltTrichotomy_lt (h : x < y) : ltTrichotomy x y p q r = p := ltByCases_lt h
@[simp]
lemma ltTrichotomy_gt (h : y < x) : ltTrichotomy x y p q r = r := ltByCases_gt h
@[simp]
lemma ltTrichotomy_eq (h : x = y) : ltTrichotomy x y p q r = q := ltByCases_eq h
lemma ltTrichotomy_not_lt (h : ¬ x < y) :
ltTrichotomy x y p q r = if y < x then r else q := ltByCases_not_lt h
lemma ltTrichotomy_not_gt (h : ¬ y < x) :
ltTrichotomy x y p q r = if x < y then p else q := ltByCases_not_gt h
lemma ltTrichotomy_ne (h : x ≠ y) :
ltTrichotomy x y p q r = if x < y then p else r := ltByCases_ne h
lemma ltTrichotomy_comm : ltTrichotomy x y p q r = ltTrichotomy y x r q p := ltByCases_comm
lemma ltTrichotomy_self {p : P} : ltTrichotomy x y p p p = p :=
ltByCases_rec p (fun _ => rfl) (fun _ => rfl) (fun _ => rfl)
lemma ltTrichotomy_eq_iff : ltTrichotomy x y p q r = s ↔
(x < y ∧ p = s) ∨ (x = y ∧ q = s) ∨ (y < x ∧ r = s) := by
refine ltByCases x y (fun h => ?_) (fun h => ?_) (fun h => ?_)
· simp only [ltTrichotomy_lt, false_and, true_and, or_false, h, h.not_lt, h.ne]
· simp only [ltTrichotomy_eq, false_and, true_and, or_false, false_or, h, lt_irrefl]
· simp only [ltTrichotomy_gt, false_and, true_and, false_or, h, h.not_lt, h.ne']
lemma ltTrichotomy_congr {x' y' : α} {p' q' r' : P} (ltc : (x < y) ↔ (x' < y'))
(gtc : (y < x) ↔ (y' < x')) (hh'₁ : x' < y' → p = p')
(hh'₂ : x' = y' → q = q') (hh'₃ : y' < x' → r = r') :
ltTrichotomy x y p q r = ltTrichotomy x' y' p' q' r' :=
ltByCases_congr ltc gtc hh'₁ hh'₂ hh'₃
end ltByCases
/-! #### `min`/`max` recursors -/
section MinMaxRec
variable {p : α → Prop}
lemma min_rec (ha : a ≤ b → p a) (hb : b ≤ a → p b) : p (min a b) := by
obtain hab | hba := le_total a b <;> simp [min_eq_left, min_eq_right, *]
lemma max_rec (ha : b ≤ a → p a) (hb : a ≤ b → p b) : p (max a b) := by
obtain hab | hba := le_total a b <;> simp [max_eq_left, max_eq_right, *]
lemma min_rec' (p : α → Prop) (ha : p a) (hb : p b) : p (min a b) :=
min_rec (fun _ ↦ ha) fun _ ↦ hb
lemma max_rec' (p : α → Prop) (ha : p a) (hb : p b) : p (max a b) :=
max_rec (fun _ ↦ ha) fun _ ↦ hb
lemma min_def_lt (a b : α) : min a b = if a < b then a else b := by
rw [min_comm, min_def, ← ite_not]; simp only [not_le]
lemma max_def_lt (a b : α) : max a b = if a < b then b else a := by
rw [max_comm, max_def, ← ite_not]; simp only [not_le]
end MinMaxRec
end LinearOrder
/-! ### Implications -/
lemma lt_imp_lt_of_le_imp_le {β} [LinearOrder α] [Preorder β] {a b : α} {c d : β}
(H : a ≤ b → c ≤ d) (h : d < c) : b < a :=
lt_of_not_le fun h' ↦ (H h').not_lt h
lemma le_imp_le_iff_lt_imp_lt {β} [LinearOrder α] [LinearOrder β] {a b : α} {c d : β} :
a ≤ b → c ≤ d ↔ d < c → b < a :=
⟨lt_imp_lt_of_le_imp_le, le_imp_le_of_lt_imp_lt⟩
lemma lt_iff_lt_of_le_iff_le' {β} [Preorder α] [Preorder β] {a b : α} {c d : β}
(H : a ≤ b ↔ c ≤ d) (H' : b ≤ a ↔ d ≤ c) : b < a ↔ d < c :=
lt_iff_le_not_le.trans <| (and_congr H' (not_congr H)).trans lt_iff_le_not_le.symm
lemma lt_iff_lt_of_le_iff_le {β} [LinearOrder α] [LinearOrder β] {a b : α} {c d : β}
(H : a ≤ b ↔ c ≤ d) : b < a ↔ d < c := not_le.symm.trans <| (not_congr H).trans <| not_le
lemma le_iff_le_iff_lt_iff_lt {β} [LinearOrder α] [LinearOrder β] {a b : α} {c d : β} :
(a ≤ b ↔ c ≤ d) ↔ (b < a ↔ d < c) :=
⟨lt_iff_lt_of_le_iff_le, fun H ↦ not_lt.symm.trans <| (not_congr H).trans <| not_lt⟩
/-- A symmetric relation implies two values are equal, when it implies they're less-equal. -/
lemma rel_imp_eq_of_rel_imp_le [PartialOrder β] (r : α → α → Prop) [IsSymm α r] {f : α → β}
(h : ∀ a b, r a b → f a ≤ f b) {a b : α} : r a b → f a = f b := fun hab ↦
le_antisymm (h a b hab) (h b a <| symm hab)
/-! ### Extensionality lemmas -/
@[ext]
lemma Preorder.toLE_injective : Function.Injective (@Preorder.toLE α) :=
fun
| { lt := A_lt, lt_iff_le_not_le := A_iff, .. },
{ lt := B_lt, lt_iff_le_not_le := B_iff, .. } => by
rintro ⟨⟩
have : A_lt = B_lt := by
funext a b
rw [A_iff, B_iff]
cases this
congr
@[ext]
lemma PartialOrder.toPreorder_injective : Function.Injective (@PartialOrder.toPreorder α) := by
rintro ⟨⟩ ⟨⟩ ⟨⟩; congr
@[ext]
lemma LinearOrder.toPartialOrder_injective : Function.Injective (@LinearOrder.toPartialOrder α) :=
fun
| { le := A_le, lt := A_lt,
toDecidableLE := A_decidableLE, toDecidableEq := A_decidableEq, toDecidableLT := A_decidableLT
min := A_min, max := A_max, min_def := A_min_def, max_def := A_max_def,
compare := A_compare, compare_eq_compareOfLessAndEq := A_compare_canonical, .. },
{ le := B_le, lt := B_lt,
toDecidableLE := B_decidableLE, toDecidableEq := B_decidableEq, toDecidableLT := B_decidableLT
min := B_min, max := B_max, min_def := B_min_def, max_def := B_max_def,
compare := B_compare, compare_eq_compareOfLessAndEq := B_compare_canonical, .. } => by
rintro ⟨⟩
obtain rfl : A_decidableLE = B_decidableLE := Subsingleton.elim _ _
obtain rfl : A_decidableEq = B_decidableEq := Subsingleton.elim _ _
obtain rfl : A_decidableLT = B_decidableLT := Subsingleton.elim _ _
have : A_min = B_min := by
funext a b
exact (A_min_def _ _).trans (B_min_def _ _).symm
cases this
have : A_max = B_max := by
funext a b
exact (A_max_def _ _).trans (B_max_def _ _).symm
cases this
have : A_compare = B_compare := by
funext a b
exact (A_compare_canonical _ _).trans (B_compare_canonical _ _).symm
congr
lemma Preorder.ext {A B : Preorder α} (H : ∀ x y : α, (haveI := A; x ≤ y) ↔ x ≤ y) : A = B := by
ext x y; exact H x y
lemma PartialOrder.ext {A B : PartialOrder α} (H : ∀ x y : α, (haveI := A; x ≤ y) ↔ x ≤ y) :
A = B := by ext x y; exact H x y
lemma PartialOrder.ext_lt {A B : PartialOrder α} (H : ∀ x y : α, (haveI := A; x < y) ↔ x < y) :
A = B := by ext x y; rw [le_iff_lt_or_eq, @le_iff_lt_or_eq _ A, H]
lemma LinearOrder.ext {A B : LinearOrder α} (H : ∀ x y : α, (haveI := A; x ≤ y) ↔ x ≤ y) :
A = B := by ext x y; exact H x y
lemma LinearOrder.ext_lt {A B : LinearOrder α} (H : ∀ x y : α, (haveI := A; x < y) ↔ x < y) :
A = B := LinearOrder.toPartialOrder_injective (PartialOrder.ext_lt H)
/-! ### Order dual -/
/-- Type synonym to equip a type with the dual order: `≤` means `≥` and `<` means `>`. `αᵒᵈ` is
notation for `OrderDual α`. -/
def OrderDual (α : Type*) : Type _ :=
α
@[inherit_doc]
notation:max α "ᵒᵈ" => OrderDual α
namespace OrderDual
instance (α : Type*) [h : Nonempty α] : Nonempty αᵒᵈ :=
h
instance (α : Type*) [h : Subsingleton α] : Subsingleton αᵒᵈ :=
h
instance (α : Type*) [LE α] : LE αᵒᵈ :=
⟨fun x y : α ↦ y ≤ x⟩
instance (α : Type*) [LT α] : LT αᵒᵈ :=
⟨fun x y : α ↦ y < x⟩
instance instOrd (α : Type*) [Ord α] : Ord αᵒᵈ where
compare := fun (a b : α) ↦ compare b a
instance instSup (α : Type*) [Min α] : Max αᵒᵈ :=
⟨((· ⊓ ·) : α → α → α)⟩
instance instInf (α : Type*) [Max α] : Min αᵒᵈ :=
⟨((· ⊔ ·) : α → α → α)⟩
instance instPreorder (α : Type*) [Preorder α] : Preorder αᵒᵈ where
le_refl := fun _ ↦ le_refl _
le_trans := fun _ _ _ hab hbc ↦ hbc.trans hab
lt_iff_le_not_le := fun _ _ ↦ lt_iff_le_not_le
instance instPartialOrder (α : Type*) [PartialOrder α] : PartialOrder αᵒᵈ where
__ := inferInstanceAs (Preorder αᵒᵈ)
le_antisymm := fun a b hab hba ↦ @le_antisymm α _ a b hba hab
instance instLinearOrder (α : Type*) [LinearOrder α] : LinearOrder αᵒᵈ where
__ := inferInstanceAs (PartialOrder αᵒᵈ)
__ := inferInstanceAs (Ord αᵒᵈ)
le_total := fun a b : α ↦ le_total b a
max := fun a b ↦ (min a b : α)
min := fun a b ↦ (max a b : α)
min_def := fun a b ↦ show (max .. : α) = _ by rw [max_comm, max_def]; rfl
max_def := fun a b ↦ show (min .. : α) = _ by rw [min_comm, min_def]; rfl
toDecidableLE := (inferInstance : DecidableRel (fun a b : α ↦ b ≤ a))
toDecidableLT := (inferInstance : DecidableRel (fun a b : α ↦ b < a))
toDecidableEq := (inferInstance : DecidableEq α)
compare_eq_compareOfLessAndEq a b := by
simp only [compare, LinearOrder.compare_eq_compareOfLessAndEq, compareOfLessAndEq, eq_comm]
rfl
/-- The opposite linear order to a given linear order -/
def _root_.LinearOrder.swap (α : Type*) (_ : LinearOrder α) : LinearOrder α :=
inferInstanceAs <| LinearOrder (OrderDual α)
instance : ∀ [Inhabited α], Inhabited αᵒᵈ := fun [x : Inhabited α] => x
theorem Ord.dual_dual (α : Type*) [H : Ord α] : OrderDual.instOrd αᵒᵈ = H :=
rfl
theorem Preorder.dual_dual (α : Type*) [H : Preorder α] : OrderDual.instPreorder αᵒᵈ = H :=
rfl
theorem instPartialOrder.dual_dual (α : Type*) [H : PartialOrder α] :
OrderDual.instPartialOrder αᵒᵈ = H :=
rfl
theorem instLinearOrder.dual_dual (α : Type*) [H : LinearOrder α] :
OrderDual.instLinearOrder αᵒᵈ = H :=
rfl
end OrderDual
/-! ### `HasCompl` -/
instance Prop.hasCompl : HasCompl Prop :=
⟨Not⟩
instance Pi.hasCompl [∀ i, HasCompl (π i)] : HasCompl (∀ i, π i) :=
⟨fun x i ↦ (x i)ᶜ⟩
theorem Pi.compl_def [∀ i, HasCompl (π i)] (x : ∀ i, π i) :
xᶜ = fun i ↦ (x i)ᶜ :=
rfl
@[simp]
theorem Pi.compl_apply [∀ i, HasCompl (π i)] (x : ∀ i, π i) (i : ι) :
xᶜ i = (x i)ᶜ :=
rfl
instance IsIrrefl.compl (r) [IsIrrefl α r] : IsRefl α rᶜ :=
⟨@irrefl α r _⟩
instance IsRefl.compl (r) [IsRefl α r] : IsIrrefl α rᶜ :=
⟨fun a ↦ not_not_intro (refl a)⟩
theorem compl_lt [LinearOrder α] : (· < · : α → α → _)ᶜ = (· ≥ ·) := by ext; simp [compl]
theorem compl_le [LinearOrder α] : (· ≤ · : α → α → _)ᶜ = (· > ·) := by ext; simp [compl]
theorem compl_gt [LinearOrder α] : (· > · : α → α → _)ᶜ = (· ≤ ·) := by ext; simp [compl]
theorem compl_ge [LinearOrder α] : (· ≥ · : α → α → _)ᶜ = (· < ·) := by ext; simp [compl]
instance Ne.instIsEquiv_compl : IsEquiv α (· ≠ ·)ᶜ := by
convert eq_isEquiv α
simp [compl]
/-! ### Order instances on the function space -/
instance Pi.hasLe [∀ i, LE (π i)] :
LE (∀ i, π i) where le x y := ∀ i, x i ≤ y i
theorem Pi.le_def [∀ i, LE (π i)] {x y : ∀ i, π i} :
x ≤ y ↔ ∀ i, x i ≤ y i :=
Iff.rfl
instance Pi.preorder [∀ i, Preorder (π i)] : Preorder (∀ i, π i) where
__ := inferInstanceAs (LE (∀ i, π i))
le_refl := fun a i ↦ le_refl (a i)
le_trans := fun _ _ _ h₁ h₂ i ↦ le_trans (h₁ i) (h₂ i)
theorem Pi.lt_def [∀ i, Preorder (π i)] {x y : ∀ i, π i} :
x < y ↔ x ≤ y ∧ ∃ i, x i < y i := by
simp +contextual [lt_iff_le_not_le, Pi.le_def]
instance Pi.partialOrder [∀ i, PartialOrder (π i)] : PartialOrder (∀ i, π i) where
__ := Pi.preorder
le_antisymm := fun _ _ h1 h2 ↦ funext fun b ↦ (h1 b).antisymm (h2 b)
namespace Sum
variable {α₁ α₂ : Type*} [LE β]
@[simp]
lemma elim_le_elim_iff {u₁ v₁ : α₁ → β} {u₂ v₂ : α₂ → β} :
Sum.elim u₁ u₂ ≤ Sum.elim v₁ v₂ ↔ u₁ ≤ v₁ ∧ u₂ ≤ v₂ :=
Sum.forall
lemma const_le_elim_iff {b : β} {v₁ : α₁ → β} {v₂ : α₂ → β} :
Function.const _ b ≤ Sum.elim v₁ v₂ ↔ Function.const _ b ≤ v₁ ∧ Function.const _ b ≤ v₂ :=
elim_const_const b ▸ elim_le_elim_iff ..
lemma elim_le_const_iff {b : β} {u₁ : α₁ → β} {u₂ : α₂ → β} :
Sum.elim u₁ u₂ ≤ Function.const _ b ↔ u₁ ≤ Function.const _ b ∧ u₂ ≤ Function.const _ b :=
elim_const_const b ▸ elim_le_elim_iff ..
end Sum
section Pi
/-- A function `a` is strongly less than a function `b` if `a i < b i` for all `i`. -/
def StrongLT [∀ i, LT (π i)] (a b : ∀ i, π i) : Prop :=
∀ i, a i < b i
@[inherit_doc]
local infixl:50 " ≺ " => StrongLT
variable [∀ i, Preorder (π i)] {a b c : ∀ i, π i}
theorem le_of_strongLT (h : a ≺ b) : a ≤ b := fun _ ↦ (h _).le
theorem lt_of_strongLT [Nonempty ι] (h : a ≺ b) : a < b := by
inhabit ι
exact Pi.lt_def.2 ⟨le_of_strongLT h, default, h _⟩
theorem strongLT_of_strongLT_of_le (hab : a ≺ b) (hbc : b ≤ c) : a ≺ c := fun _ ↦
(hab _).trans_le <| hbc _
theorem strongLT_of_le_of_strongLT (hab : a ≤ b) (hbc : b ≺ c) : a ≺ c := fun _ ↦
(hab _).trans_lt <| hbc _
alias StrongLT.le := le_of_strongLT
alias StrongLT.lt := lt_of_strongLT
alias StrongLT.trans_le := strongLT_of_strongLT_of_le
alias LE.le.trans_strongLT := strongLT_of_le_of_strongLT
end Pi
section Function
variable [DecidableEq ι] [∀ i, Preorder (π i)] {x y : ∀ i, π i} {i : ι} {a b : π i}
theorem le_update_iff : x ≤ Function.update y i a ↔ x i ≤ a ∧ ∀ (j) (_ : j ≠ i), x j ≤ y j :=
Function.forall_update_iff _ fun j z ↦ x j ≤ z
theorem update_le_iff : Function.update x i a ≤ y ↔ a ≤ y i ∧ ∀ (j) (_ : j ≠ i), x j ≤ y j :=
Function.forall_update_iff _ fun j z ↦ z ≤ y j
theorem update_le_update_iff :
Function.update x i a ≤ Function.update y i b ↔ a ≤ b ∧ ∀ (j) (_ : j ≠ i), x j ≤ y j := by
simp +contextual [update_le_iff]
@[simp]
theorem update_le_update_iff' : update x i a ≤ update x i b ↔ a ≤ b := by
simp [update_le_update_iff]
@[simp]
theorem update_lt_update_iff : update x i a < update x i b ↔ a < b :=
lt_iff_lt_of_le_iff_le' update_le_update_iff' update_le_update_iff'
@[simp]
theorem le_update_self_iff : x ≤ update x i a ↔ x i ≤ a := by simp [le_update_iff]
@[simp]
theorem update_le_self_iff : update x i a ≤ x ↔ a ≤ x i := by simp [update_le_iff]
@[simp]
theorem lt_update_self_iff : x < update x i a ↔ x i < a := by simp [lt_iff_le_not_le]
@[simp]
theorem update_lt_self_iff : update x i a < x ↔ a < x i := by simp [lt_iff_le_not_le]
end Function
instance Pi.sdiff [∀ i, SDiff (π i)] : SDiff (∀ i, π i) :=
⟨fun x y i ↦ x i \ y i⟩
theorem Pi.sdiff_def [∀ i, SDiff (π i)] (x y : ∀ i, π i) :
x \ y = fun i ↦ x i \ y i :=
rfl
@[simp]
theorem Pi.sdiff_apply [∀ i, SDiff (π i)] (x y : ∀ i, π i) (i : ι) :
(x \ y) i = x i \ y i :=
rfl
namespace Function
variable [Preorder α] [Nonempty β] {a b : α}
@[simp]
theorem const_le_const : const β a ≤ const β b ↔ a ≤ b := by simp [Pi.le_def]
@[simp]
theorem const_lt_const : const β a < const β b ↔ a < b := by simpa [Pi.lt_def] using le_of_lt
end Function
/-! ### Lifts of order instances -/
/-- Transfer a `Preorder` on `β` to a `Preorder` on `α` using a function `f : α → β`.
See note [reducible non-instances]. -/
abbrev Preorder.lift [Preorder β] (f : α → β) : Preorder α where
le x y := f x ≤ f y
le_refl _ := le_rfl
le_trans _ _ _ := _root_.le_trans
lt x y := f x < f y
lt_iff_le_not_le _ _ := _root_.lt_iff_le_not_le
/-- Transfer a `PartialOrder` on `β` to a `PartialOrder` on `α` using an injective
function `f : α → β`. See note [reducible non-instances]. -/
abbrev PartialOrder.lift [PartialOrder β] (f : α → β) (inj : Injective f) : PartialOrder α :=
{ Preorder.lift f with le_antisymm := fun _ _ h₁ h₂ ↦ inj (h₁.antisymm h₂) }
theorem compare_of_injective_eq_compareOfLessAndEq (a b : α) [LinearOrder β]
[DecidableEq α] (f : α → β) (inj : Injective f)
[Decidable (LT.lt (self := PartialOrder.lift f inj |>.toLT) a b)] :
compare (f a) (f b) =
@compareOfLessAndEq _ a b (PartialOrder.lift f inj |>.toLT) _ _ := by
have h := LinearOrder.compare_eq_compareOfLessAndEq (f a) (f b)
simp only [h, compareOfLessAndEq]
split_ifs <;> try (first | rfl | contradiction)
· have : ¬ f a = f b := by rename_i h; exact inj.ne h
contradiction
· have : f a = f b := by rename_i h; exact congrArg f h
contradiction
/-- Transfer a `LinearOrder` on `β` to a `LinearOrder` on `α` using an injective
function `f : α → β`. This version takes `[Max α]` and `[Min α]` as arguments, then uses
them for `max` and `min` fields. See `LinearOrder.lift'` for a version that autogenerates `min` and
`max` fields, and `LinearOrder.liftWithOrd` for one that does not auto-generate `compare`
fields. See note [reducible non-instances]. -/
abbrev LinearOrder.lift [LinearOrder β] [Max α] [Min α] (f : α → β) (inj : Injective f)
(hsup : ∀ x y, f (x ⊔ y) = max (f x) (f y)) (hinf : ∀ x y, f (x ⊓ y) = min (f x) (f y)) :
LinearOrder α :=
letI instOrdα : Ord α := ⟨fun a b ↦ compare (f a) (f b)⟩
letI decidableLE := fun x y ↦ (inferInstance : Decidable (f x ≤ f y))
letI decidableLT := fun x y ↦ (inferInstance : Decidable (f x < f y))
letI decidableEq := fun x y ↦ decidable_of_iff (f x = f y) inj.eq_iff
{ PartialOrder.lift f inj, instOrdα with
le_total := fun x y ↦ le_total (f x) (f y)
toDecidableLE := decidableLE
toDecidableLT := decidableLT
toDecidableEq := decidableEq
min := (· ⊓ ·)
max := (· ⊔ ·)
min_def := by
intros x y
apply inj
rw [apply_ite f]
exact (hinf _ _).trans (min_def _ _)
max_def := by
intros x y
apply inj
rw [apply_ite f]
exact (hsup _ _).trans (max_def _ _)
compare_eq_compareOfLessAndEq := fun a b ↦
compare_of_injective_eq_compareOfLessAndEq a b f inj }
/-- Transfer a `LinearOrder` on `β` to a `LinearOrder` on `α` using an injective
function `f : α → β`. This version autogenerates `min` and `max` fields. See `LinearOrder.lift`
for a version that takes `[Max α]` and `[Min α]`, then uses them as `max` and `min`. See
`LinearOrder.liftWithOrd'` for a version which does not auto-generate `compare` fields.
See note [reducible non-instances]. -/
abbrev LinearOrder.lift' [LinearOrder β] (f : α → β) (inj : Injective f) : LinearOrder α :=
@LinearOrder.lift α β _ ⟨fun x y ↦ if f x ≤ f y then y else x⟩
⟨fun x y ↦ if f x ≤ f y then x else y⟩ f inj
(fun _ _ ↦ (apply_ite f _ _ _).trans (max_def _ _).symm) fun _ _ ↦
(apply_ite f _ _ _).trans (min_def _ _).symm
/-- Transfer a `LinearOrder` on `β` to a `LinearOrder` on `α` using an injective
function `f : α → β`. This version takes `[Max α]` and `[Min α]` as arguments, then uses
them for `max` and `min` fields. It also takes `[Ord α]` as an argument and uses them for `compare`
fields. See `LinearOrder.lift` for a version that autogenerates `compare` fields, and
`LinearOrder.liftWithOrd'` for one that auto-generates `min` and `max` fields.
fields. See note [reducible non-instances]. -/
abbrev LinearOrder.liftWithOrd [LinearOrder β] [Max α] [Min α] [Ord α] (f : α → β)
(inj : Injective f) (hsup : ∀ x y, f (x ⊔ y) = max (f x) (f y))
(hinf : ∀ x y, f (x ⊓ y) = min (f x) (f y))
(compare_f : ∀ a b : α, compare a b = compare (f a) (f b)) : LinearOrder α :=
letI decidableLE := fun x y ↦ (inferInstance : Decidable (f x ≤ f y))
letI decidableLT := fun x y ↦ (inferInstance : Decidable (f x < f y))
letI decidableEq := fun x y ↦ decidable_of_iff (f x = f y) inj.eq_iff
{ PartialOrder.lift f inj with
le_total := fun x y ↦ le_total (f x) (f y)
toDecidableLE := decidableLE
toDecidableLT := decidableLT
toDecidableEq := decidableEq
min := (· ⊓ ·)
max := (· ⊔ ·)
min_def := by
intros x y
apply inj
rw [apply_ite f]
exact (hinf _ _).trans (min_def _ _)
max_def := by
intros x y
apply inj
rw [apply_ite f]
exact (hsup _ _).trans (max_def _ _)
compare_eq_compareOfLessAndEq := fun a b ↦
(compare_f a b).trans <| compare_of_injective_eq_compareOfLessAndEq a b f inj }
/-- Transfer a `LinearOrder` on `β` to a `LinearOrder` on `α` using an injective
function `f : α → β`. This version auto-generates `min` and `max` fields. It also takes `[Ord α]`
as an argument and uses them for `compare` fields. See `LinearOrder.lift` for a version that
autogenerates `compare` fields, and `LinearOrder.liftWithOrd` for one that doesn't auto-generate
`min` and `max` fields. fields. See note [reducible non-instances]. -/
abbrev LinearOrder.liftWithOrd' [LinearOrder β] [Ord α] (f : α → β)
(inj : Injective f)
(compare_f : ∀ a b : α, compare a b = compare (f a) (f b)) : LinearOrder α :=
@LinearOrder.liftWithOrd α β _ ⟨fun x y ↦ if f x ≤ f y then y else x⟩
⟨fun x y ↦ if f x ≤ f y then x else y⟩ _ f inj
(fun _ _ ↦ (apply_ite f _ _ _).trans (max_def _ _).symm)
(fun _ _ ↦ (apply_ite f _ _ _).trans (min_def _ _).symm)
compare_f
/-! ### Subtype of an order -/
namespace Subtype
instance le [LE α] {p : α → Prop} : LE (Subtype p) :=
⟨fun x y ↦ (x : α) ≤ y⟩
instance lt [LT α] {p : α → Prop} : LT (Subtype p) :=
⟨fun x y ↦ (x : α) < y⟩
@[simp]
theorem mk_le_mk [LE α] {p : α → Prop} {x y : α} {hx : p x} {hy : p y} :
(⟨x, hx⟩ : Subtype p) ≤ ⟨y, hy⟩ ↔ x ≤ y :=
Iff.rfl
@[simp]
theorem mk_lt_mk [LT α] {p : α → Prop} {x y : α} {hx : p x} {hy : p y} :
(⟨x, hx⟩ : Subtype p) < ⟨y, hy⟩ ↔ x < y :=
Iff.rfl
@[simp, norm_cast]
theorem coe_le_coe [LE α] {p : α → Prop} {x y : Subtype p} : (x : α) ≤ y ↔ x ≤ y :=
Iff.rfl
@[gcongr] alias ⟨_, GCongr.coe_le_coe⟩ := coe_le_coe
@[simp, norm_cast]
theorem coe_lt_coe [LT α] {p : α → Prop} {x y : Subtype p} : (x : α) < y ↔ x < y :=
Iff.rfl
@[gcongr] alias ⟨_, GCongr.coe_lt_coe⟩ := coe_lt_coe
instance preorder [Preorder α] (p : α → Prop) : Preorder (Subtype p) :=
Preorder.lift (fun (a : Subtype p) ↦ (a : α))
instance partialOrder [PartialOrder α] (p : α → Prop) : PartialOrder (Subtype p) :=
PartialOrder.lift (fun (a : Subtype p) ↦ (a : α)) Subtype.coe_injective
instance decidableLE [Preorder α] [h : DecidableLE α] {p : α → Prop} :
DecidableLE (Subtype p) := fun a b ↦ h a b
instance decidableLT [Preorder α] [h : DecidableLT α] {p : α → Prop} :
DecidableLT (Subtype p) := fun a b ↦ h a b
/-- A subtype of a linear order is a linear order. We explicitly give the proofs of decidable
equality and decidable order in order to ensure the decidability instances are all definitionally
equal. -/
instance instLinearOrder [LinearOrder α] (p : α → Prop) : LinearOrder (Subtype p) :=
@LinearOrder.lift (Subtype p) _ _ ⟨fun x y ↦ ⟨max x y, max_rec' _ x.2 y.2⟩⟩
⟨fun x y ↦ ⟨min x y, min_rec' _ x.2 y.2⟩⟩ (fun (a : Subtype p) ↦ (a : α))
Subtype.coe_injective (fun _ _ ↦ rfl) fun _ _ ↦
rfl
end Subtype
/-!
### Pointwise order on `α × β`
The lexicographic order is defined in `Data.Prod.Lex`, and the instances are available via the
type synonym `α ×ₗ β = α × β`.
-/
namespace Prod
section LE
variable [LE α] [LE β] {x y : α × β} {a a₁ a₂ : α} {b b₁ b₂ : β}
instance : LE (α × β) where le p q := p.1 ≤ q.1 ∧ p.2 ≤ q.2
instance instDecidableLE [Decidable (x.1 ≤ y.1)] [Decidable (x.2 ≤ y.2)] : Decidable (x ≤ y) :=
inferInstanceAs (Decidable (x.1 ≤ y.1 ∧ x.2 ≤ y.2))
lemma le_def : x ≤ y ↔ x.1 ≤ y.1 ∧ x.2 ≤ y.2 := .rfl
@[simp] lemma mk_le_mk : (a₁, b₁) ≤ (a₂, b₂) ↔ a₁ ≤ a₂ ∧ b₁ ≤ b₂ := .rfl
@[simp] lemma swap_le_swap : x.swap ≤ y.swap ↔ x ≤ y := and_comm
@[simp] lemma swap_le_mk : x.swap ≤ (b, a) ↔ x ≤ (a, b) := and_comm
@[simp] lemma mk_le_swap : (b, a) ≤ x.swap ↔ (a, b) ≤ x := and_comm
end LE
section Preorder
variable [Preorder α] [Preorder β] {a a₁ a₂ : α} {b b₁ b₂ : β} {x y : α × β}
instance : Preorder (α × β) where
__ := inferInstanceAs (LE (α × β))
le_refl := fun ⟨a, b⟩ ↦ ⟨le_refl a, le_refl b⟩
le_trans := fun ⟨_, _⟩ ⟨_, _⟩ ⟨_, _⟩ ⟨hac, hbd⟩ ⟨hce, hdf⟩ ↦ ⟨le_trans hac hce, le_trans hbd hdf⟩
@[simp]
theorem swap_lt_swap : x.swap < y.swap ↔ x < y :=
and_congr swap_le_swap (not_congr swap_le_swap)
@[simp] lemma swap_lt_mk : x.swap < (b, a) ↔ x < (a, b) := by rw [← swap_lt_swap]; simp
@[simp] lemma mk_lt_swap : (b, a) < x.swap ↔ (a, b) < x := by rw [← swap_lt_swap]; simp
theorem mk_le_mk_iff_left : (a₁, b) ≤ (a₂, b) ↔ a₁ ≤ a₂ :=
and_iff_left le_rfl
theorem mk_le_mk_iff_right : (a, b₁) ≤ (a, b₂) ↔ b₁ ≤ b₂ :=
and_iff_right le_rfl
theorem mk_lt_mk_iff_left : (a₁, b) < (a₂, b) ↔ a₁ < a₂ :=
lt_iff_lt_of_le_iff_le' mk_le_mk_iff_left mk_le_mk_iff_left
theorem mk_lt_mk_iff_right : (a, b₁) < (a, b₂) ↔ b₁ < b₂ :=
| lt_iff_lt_of_le_iff_le' mk_le_mk_iff_right mk_le_mk_iff_right
theorem lt_iff : x < y ↔ x.1 < y.1 ∧ x.2 ≤ y.2 ∨ x.1 ≤ y.1 ∧ x.2 < y.2 := by
refine ⟨fun h ↦ ?_, ?_⟩
· by_cases h₁ : y.1 ≤ x.1
· exact Or.inr ⟨h.1.1, LE.le.lt_of_not_le h.1.2 fun h₂ ↦ h.2 ⟨h₁, h₂⟩⟩
· exact Or.inl ⟨LE.le.lt_of_not_le h.1.1 h₁, h.1.2⟩
· rintro (⟨h₁, h₂⟩ | ⟨h₁, h₂⟩)
· exact ⟨⟨h₁.le, h₂⟩, fun h ↦ h₁.not_le h.1⟩
· exact ⟨⟨h₁, h₂.le⟩, fun h ↦ h₂.not_le h.2⟩
@[simp]
| Mathlib/Order/Basic.lean | 1,101 | 1,112 |
/-
Copyright (c) 2020 Yury Kudryashov. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Yury Kudryashov, Patrick Massot, Sébastien Gouëzel
-/
import Mathlib.MeasureTheory.Integral.IntervalIntegral.Basic
import Mathlib.MeasureTheory.Integral.IntervalIntegral.FundThmCalculus
import Mathlib.MeasureTheory.Integral.IntervalIntegral.IntegrationByParts
deprecated_module (since := "2025-04-13")
| Mathlib/MeasureTheory/Integral/IntervalIntegral.lean | 548 | 550 | |
/-
Copyright (c) 2018 Sébastien Gouëzel. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Sébastien Gouëzel
-/
import Mathlib.Data.Fintype.Lattice
import Mathlib.Data.Fintype.Sum
import Mathlib.Topology.Homeomorph.Lemmas
import Mathlib.Topology.MetricSpace.Antilipschitz
/-!
# Isometries
We define isometries, i.e., maps between emetric spaces that preserve
the edistance (on metric spaces, these are exactly the maps that preserve distances),
and prove their basic properties. We also introduce isometric bijections.
Since a lot of elementary properties don't require `eq_of_dist_eq_zero` we start setting up the
theory for `PseudoMetricSpace` and we specialize to `MetricSpace` when needed.
-/
open Topology
noncomputable section
universe u v w
variable {ι : Type*} {α : Type u} {β : Type v} {γ : Type w}
open Function Set
open scoped Topology ENNReal
/-- An isometry (also known as isometric embedding) is a map preserving the edistance
between pseudoemetric spaces, or equivalently the distance between pseudometric space. -/
def Isometry [PseudoEMetricSpace α] [PseudoEMetricSpace β] (f : α → β) : Prop :=
∀ x1 x2 : α, edist (f x1) (f x2) = edist x1 x2
/-- On pseudometric spaces, a map is an isometry if and only if it preserves nonnegative
distances. -/
theorem isometry_iff_nndist_eq [PseudoMetricSpace α] [PseudoMetricSpace β] {f : α → β} :
Isometry f ↔ ∀ x y, nndist (f x) (f y) = nndist x y := by
simp only [Isometry, edist_nndist, ENNReal.coe_inj]
/-- On pseudometric spaces, a map is an isometry if and only if it preserves distances. -/
theorem isometry_iff_dist_eq [PseudoMetricSpace α] [PseudoMetricSpace β] {f : α → β} :
Isometry f ↔ ∀ x y, dist (f x) (f y) = dist x y := by
simp only [isometry_iff_nndist_eq, ← coe_nndist, NNReal.coe_inj]
/-- An isometry preserves distances. -/
alias ⟨Isometry.dist_eq, _⟩ := isometry_iff_dist_eq
/-- A map that preserves distances is an isometry -/
alias ⟨_, Isometry.of_dist_eq⟩ := isometry_iff_dist_eq
/-- An isometry preserves non-negative distances. -/
alias ⟨Isometry.nndist_eq, _⟩ := isometry_iff_nndist_eq
/-- A map that preserves non-negative distances is an isometry. -/
alias ⟨_, Isometry.of_nndist_eq⟩ := isometry_iff_nndist_eq
namespace Isometry
section PseudoEmetricIsometry
variable [PseudoEMetricSpace α] [PseudoEMetricSpace β] [PseudoEMetricSpace γ]
variable {f : α → β} {x : α}
/-- An isometry preserves edistances. -/
theorem edist_eq (hf : Isometry f) (x y : α) : edist (f x) (f y) = edist x y :=
hf x y
theorem lipschitz (h : Isometry f) : LipschitzWith 1 f :=
LipschitzWith.of_edist_le fun x y => (h x y).le
theorem antilipschitz (h : Isometry f) : AntilipschitzWith 1 f := fun x y => by
simp only [h x y, ENNReal.coe_one, one_mul, le_refl]
/-- Any map on a subsingleton is an isometry -/
@[nontriviality]
theorem _root_.isometry_subsingleton [Subsingleton α] : Isometry f := fun x y => by
rw [Subsingleton.elim x y]; simp
|
/-- The identity is an isometry -/
| Mathlib/Topology/MetricSpace/Isometry.lean | 83 | 84 |
/-
Copyright (c) 2017 Johannes Hölzl. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johannes Hölzl, Kim Morrison
-/
import Mathlib.Algebra.Group.Indicator
import Mathlib.Algebra.Group.InjSurj
import Mathlib.Data.Set.Finite.Basic
import Mathlib.Tactic.FastInstance
import Mathlib.Algebra.Group.Equiv.Defs
/-!
# Type of functions with finite support
For any type `α` and any type `M` with zero, we define the type `Finsupp α M` (notation: `α →₀ M`)
of finitely supported functions from `α` to `M`, i.e. the functions which are zero everywhere
on `α` except on a finite set.
Functions with finite support are used (at least) in the following parts of the library:
* `MonoidAlgebra R M` and `AddMonoidAlgebra R M` are defined as `M →₀ R`;
* polynomials and multivariate polynomials are defined as `AddMonoidAlgebra`s, hence they use
`Finsupp` under the hood;
* the linear combination of a family of vectors `v i` with coefficients `f i` (as used, e.g., to
define linearly independent family `LinearIndependent`) is defined as a map
`Finsupp.linearCombination : (ι → M) → (ι →₀ R) →ₗ[R] M`.
Some other constructions are naturally equivalent to `α →₀ M` with some `α` and `M` but are defined
in a different way in the library:
* `Multiset α ≃+ α →₀ ℕ`;
* `FreeAbelianGroup α ≃+ α →₀ ℤ`.
Most of the theory assumes that the range is a commutative additive monoid. This gives us the big
sum operator as a powerful way to construct `Finsupp` elements, which is defined in
`Mathlib.Algebra.BigOperators.Finsupp.Basic`.
Many constructions based on `α →₀ M` are `def`s rather than `abbrev`s to avoid reusing unwanted type
class instances. E.g., `MonoidAlgebra`, `AddMonoidAlgebra`, and types based on these two have
non-pointwise multiplication.
## Main declarations
* `Finsupp`: The type of finitely supported functions from `α` to `β`.
* `Finsupp.onFinset`: The restriction of a function to a `Finset` as a `Finsupp`.
* `Finsupp.mapRange`: Composition of a `ZeroHom` with a `Finsupp`.
* `Finsupp.embDomain`: Maps the domain of a `Finsupp` by an embedding.
* `Finsupp.zipWith`: Postcomposition of two `Finsupp`s with a function `f` such that `f 0 0 = 0`.
## Notations
This file adds `α →₀ M` as a global notation for `Finsupp α M`.
We also use the following convention for `Type*` variables in this file
* `α`, `β`, `γ`: types with no additional structure that appear as the first argument to `Finsupp`
somewhere in the statement;
* `ι` : an auxiliary index type;
* `M`, `M'`, `N`, `P`: types with `Zero` or `(Add)(Comm)Monoid` structure; `M` is also used
for a (semi)module over a (semi)ring.
* `G`, `H`: groups (commutative or not, multiplicative or additive);
* `R`, `S`: (semi)rings.
## Implementation notes
This file is a `noncomputable theory` and uses classical logic throughout.
## TODO
* Expand the list of definitions and important lemmas to the module docstring.
-/
assert_not_exists CompleteLattice Submonoid
noncomputable section
open Finset Function
variable {α β γ ι M M' N P G H R S : Type*}
/-- `Finsupp α M`, denoted `α →₀ M`, is the type of functions `f : α → M` such that
`f x = 0` for all but finitely many `x`. -/
structure Finsupp (α : Type*) (M : Type*) [Zero M] where
/-- The support of a finitely supported function (aka `Finsupp`). -/
support : Finset α
/-- The underlying function of a bundled finitely supported function (aka `Finsupp`). -/
toFun : α → M
/-- The witness that the support of a `Finsupp` is indeed the exact locus where its
underlying function is nonzero. -/
mem_support_toFun : ∀ a, a ∈ support ↔ toFun a ≠ 0
@[inherit_doc]
infixr:25 " →₀ " => Finsupp
namespace Finsupp
/-! ### Basic declarations about `Finsupp` -/
section Basic
variable [Zero M]
instance instFunLike : FunLike (α →₀ M) α M :=
⟨toFun, by
rintro ⟨s, f, hf⟩ ⟨t, g, hg⟩ (rfl : f = g)
congr
ext a
exact (hf _).trans (hg _).symm⟩
@[ext]
theorem ext {f g : α →₀ M} (h : ∀ a, f a = g a) : f = g :=
DFunLike.ext _ _ h
lemma ne_iff {f g : α →₀ M} : f ≠ g ↔ ∃ a, f a ≠ g a := DFunLike.ne_iff
@[simp, norm_cast]
theorem coe_mk (f : α → M) (s : Finset α) (h : ∀ a, a ∈ s ↔ f a ≠ 0) : ⇑(⟨s, f, h⟩ : α →₀ M) = f :=
rfl
instance instZero : Zero (α →₀ M) :=
⟨⟨∅, 0, fun _ => ⟨fun h ↦ (not_mem_empty _ h).elim, fun H => (H rfl).elim⟩⟩⟩
@[simp, norm_cast] lemma coe_zero : ⇑(0 : α →₀ M) = 0 := rfl
theorem zero_apply {a : α} : (0 : α →₀ M) a = 0 :=
rfl
@[simp]
theorem support_zero : (0 : α →₀ M).support = ∅ :=
rfl
instance instInhabited : Inhabited (α →₀ M) :=
⟨0⟩
@[simp]
theorem mem_support_iff {f : α →₀ M} : ∀ {a : α}, a ∈ f.support ↔ f a ≠ 0 :=
@(f.mem_support_toFun)
@[simp, norm_cast]
theorem fun_support_eq (f : α →₀ M) : Function.support f = f.support :=
Set.ext fun _x => mem_support_iff.symm
theorem not_mem_support_iff {f : α →₀ M} {a} : a ∉ f.support ↔ f a = 0 :=
not_iff_comm.1 mem_support_iff.symm
@[simp, norm_cast]
theorem coe_eq_zero {f : α →₀ M} : (f : α → M) = 0 ↔ f = 0 := by rw [← coe_zero, DFunLike.coe_fn_eq]
theorem ext_iff' {f g : α →₀ M} : f = g ↔ f.support = g.support ∧ ∀ x ∈ f.support, f x = g x :=
⟨fun h => h ▸ ⟨rfl, fun _ _ => rfl⟩, fun ⟨h₁, h₂⟩ =>
ext fun a => by
classical
exact if h : a ∈ f.support then h₂ a h else by
have hf : f a = 0 := not_mem_support_iff.1 h
have hg : g a = 0 := by rwa [h₁, not_mem_support_iff] at h
rw [hf, hg]⟩
@[simp]
theorem support_eq_empty {f : α →₀ M} : f.support = ∅ ↔ f = 0 :=
mod_cast @Function.support_eq_empty_iff _ _ _ f
theorem support_nonempty_iff {f : α →₀ M} : f.support.Nonempty ↔ f ≠ 0 := by
simp only [Finsupp.support_eq_empty, Finset.nonempty_iff_ne_empty, Ne]
theorem card_support_eq_zero {f : α →₀ M} : #f.support = 0 ↔ f = 0 := by simp
instance instDecidableEq [DecidableEq α] [DecidableEq M] : DecidableEq (α →₀ M) := fun f g =>
decidable_of_iff (f.support = g.support ∧ ∀ a ∈ f.support, f a = g a) ext_iff'.symm
theorem finite_support (f : α →₀ M) : Set.Finite (Function.support f) :=
f.fun_support_eq.symm ▸ f.support.finite_toSet
theorem support_subset_iff {s : Set α} {f : α →₀ M} :
↑f.support ⊆ s ↔ ∀ a ∉ s, f a = 0 := by
simp only [Set.subset_def, mem_coe, mem_support_iff]; exact forall_congr' fun a => not_imp_comm
/-- Given `Finite α`, `equivFunOnFinite` is the `Equiv` between `α →₀ β` and `α → β`.
(All functions on a finite type are finitely supported.) -/
@[simps]
def equivFunOnFinite [Finite α] : (α →₀ M) ≃ (α → M) where
toFun := (⇑)
invFun f := mk (Function.support f).toFinite.toFinset f fun _a => Set.Finite.mem_toFinset _
left_inv _f := ext fun _x => rfl
right_inv _f := rfl
@[simp]
theorem equivFunOnFinite_symm_coe {α} [Finite α] (f : α →₀ M) : equivFunOnFinite.symm f = f :=
equivFunOnFinite.symm_apply_apply f
@[simp]
lemma coe_equivFunOnFinite_symm {α} [Finite α] (f : α → M) : ⇑(equivFunOnFinite.symm f) = f := rfl
/--
If `α` has a unique term, the type of finitely supported functions `α →₀ β` is equivalent to `β`.
-/
@[simps!]
noncomputable def _root_.Equiv.finsuppUnique {ι : Type*} [Unique ι] : (ι →₀ M) ≃ M :=
Finsupp.equivFunOnFinite.trans (Equiv.funUnique ι M)
@[ext]
theorem unique_ext [Unique α] {f g : α →₀ M} (h : f default = g default) : f = g :=
ext fun a => by rwa [Unique.eq_default a]
end Basic
/-! ### Declarations about `onFinset` -/
section OnFinset
variable [Zero M]
/-- `Finsupp.onFinset s f hf` is the finsupp function representing `f` restricted to the finset `s`.
The function must be `0` outside of `s`. Use this when the set needs to be filtered anyways,
otherwise a better set representation is often available. -/
def onFinset (s : Finset α) (f : α → M) (hf : ∀ a, f a ≠ 0 → a ∈ s) : α →₀ M where
support :=
haveI := Classical.decEq M
{a ∈ s | f a ≠ 0}
toFun := f
mem_support_toFun := by classical simpa
@[simp, norm_cast] lemma coe_onFinset (s : Finset α) (f : α → M) (hf) : onFinset s f hf = f := rfl
@[simp]
theorem onFinset_apply {s : Finset α} {f : α → M} {hf a} : (onFinset s f hf : α →₀ M) a = f a :=
rfl
@[simp]
theorem support_onFinset_subset {s : Finset α} {f : α → M} {hf} :
(onFinset s f hf).support ⊆ s := by
classical convert filter_subset (f · ≠ 0) s
theorem mem_support_onFinset {s : Finset α} {f : α → M} (hf : ∀ a : α, f a ≠ 0 → a ∈ s) {a : α} :
a ∈ (Finsupp.onFinset s f hf).support ↔ f a ≠ 0 := by
rw [Finsupp.mem_support_iff, Finsupp.onFinset_apply]
theorem support_onFinset [DecidableEq M] {s : Finset α} {f : α → M}
(hf : ∀ a : α, f a ≠ 0 → a ∈ s) :
(Finsupp.onFinset s f hf).support = {a ∈ s | f a ≠ 0} := by
dsimp [onFinset]; congr
end OnFinset
section OfSupportFinite
variable [Zero M]
/-- The natural `Finsupp` induced by the function `f` given that it has finite support. -/
noncomputable def ofSupportFinite (f : α → M) (hf : (Function.support f).Finite) : α →₀ M where
support := hf.toFinset
toFun := f
mem_support_toFun _ := hf.mem_toFinset
theorem ofSupportFinite_coe {f : α → M} {hf : (Function.support f).Finite} :
(ofSupportFinite f hf : α → M) = f :=
rfl
instance instCanLift : CanLift (α → M) (α →₀ M) (⇑) fun f => (Function.support f).Finite where
prf f hf := ⟨ofSupportFinite f hf, rfl⟩
end OfSupportFinite
/-! ### Declarations about `mapRange` -/
section MapRange
variable [Zero M] [Zero N] [Zero P]
/-- The composition of `f : M → N` and `g : α →₀ M` is `mapRange f hf g : α →₀ N`,
which is well-defined when `f 0 = 0`.
This preserves the structure on `f`, and exists in various bundled forms for when `f` is itself
bundled (defined in `Mathlib/Data/Finsupp/Basic.lean`):
* `Finsupp.mapRange.equiv`
* `Finsupp.mapRange.zeroHom`
* `Finsupp.mapRange.addMonoidHom`
* `Finsupp.mapRange.addEquiv`
* `Finsupp.mapRange.linearMap`
* `Finsupp.mapRange.linearEquiv`
-/
def mapRange (f : M → N) (hf : f 0 = 0) (g : α →₀ M) : α →₀ N :=
onFinset g.support (f ∘ g) fun a => by
rw [mem_support_iff, not_imp_not]; exact fun H => (congr_arg f H).trans hf
@[simp]
theorem mapRange_apply {f : M → N} {hf : f 0 = 0} {g : α →₀ M} {a : α} :
mapRange f hf g a = f (g a) :=
rfl
@[simp]
theorem mapRange_zero {f : M → N} {hf : f 0 = 0} : mapRange f hf (0 : α →₀ M) = 0 :=
ext fun _ => by simp only [hf, zero_apply, mapRange_apply]
@[simp]
theorem mapRange_id (g : α →₀ M) : mapRange id rfl g = g :=
ext fun _ => rfl
theorem mapRange_comp (f : N → P) (hf : f 0 = 0) (f₂ : M → N) (hf₂ : f₂ 0 = 0) (h : (f ∘ f₂) 0 = 0)
(g : α →₀ M) : mapRange (f ∘ f₂) h g = mapRange f hf (mapRange f₂ hf₂ g) :=
ext fun _ => rfl
@[simp]
lemma mapRange_mapRange (e₁ : N → P) (e₂ : M → N) (he₁ he₂) (f : α →₀ M) :
mapRange e₁ he₁ (mapRange e₂ he₂ f) = mapRange (e₁ ∘ e₂) (by simp [*]) f := ext fun _ ↦ rfl
theorem support_mapRange {f : M → N} {hf : f 0 = 0} {g : α →₀ M} :
(mapRange f hf g).support ⊆ g.support :=
support_onFinset_subset
theorem support_mapRange_of_injective {e : M → N} (he0 : e 0 = 0) (f : ι →₀ M)
(he : Function.Injective e) : (Finsupp.mapRange e he0 f).support = f.support := by
ext
simp only [Finsupp.mem_support_iff, Ne, Finsupp.mapRange_apply]
exact he.ne_iff' he0
lemma range_mapRange (e : M → N) (he₀ : e 0 = 0) :
Set.range (Finsupp.mapRange (α := α) e he₀) = {g | ∀ i, g i ∈ Set.range e} := by
ext g
simp only [Set.mem_range, Set.mem_setOf]
constructor
· rintro ⟨g, rfl⟩ i
simp
· intro h
classical
choose f h using h
use onFinset g.support (Set.indicator g.support f) (by aesop)
ext i
simp only [mapRange_apply, onFinset_apply, Set.indicator_apply]
split_ifs <;> simp_all
/-- `Finsupp.mapRange` of a injective function is injective. -/
lemma mapRange_injective (e : M → N) (he₀ : e 0 = 0) (he : Injective e) :
Injective (Finsupp.mapRange (α := α) e he₀) := by
intro a b h
rw [Finsupp.ext_iff] at h ⊢
simpa only [mapRange_apply, he.eq_iff] using h
/-- `Finsupp.mapRange` of a surjective function is surjective. -/
lemma mapRange_surjective (e : M → N) (he₀ : e 0 = 0) (he : Surjective e) :
Surjective (Finsupp.mapRange (α := α) e he₀) := by
rw [← Set.range_eq_univ, range_mapRange, he.range_eq]
simp
end MapRange
/-! ### Declarations about `embDomain` -/
section EmbDomain
variable [Zero M] [Zero N]
/-- Given `f : α ↪ β` and `v : α →₀ M`, `Finsupp.embDomain f v : β →₀ M`
is the finitely supported function whose value at `f a : β` is `v a`.
For a `b : β` outside the range of `f`, it is zero. -/
def embDomain (f : α ↪ β) (v : α →₀ M) : β →₀ M where
support := v.support.map f
toFun a₂ :=
haveI := Classical.decEq β
if h : a₂ ∈ v.support.map f then
v
(v.support.choose (fun a₁ => f a₁ = a₂)
(by
rcases Finset.mem_map.1 h with ⟨a, ha, rfl⟩
exact ExistsUnique.intro a ⟨ha, rfl⟩ fun b ⟨_, hb⟩ => f.injective hb))
else 0
mem_support_toFun a₂ := by
dsimp
split_ifs with h
· simp only [h, true_iff, Ne]
rw [← not_mem_support_iff, not_not]
classical apply Finset.choose_mem
· simp only [h, Ne, ne_self_iff_false, not_true_eq_false]
@[simp]
theorem support_embDomain (f : α ↪ β) (v : α →₀ M) : (embDomain f v).support = v.support.map f :=
rfl
@[simp]
theorem embDomain_zero (f : α ↪ β) : (embDomain f 0 : β →₀ M) = 0 :=
rfl
@[simp]
theorem embDomain_apply (f : α ↪ β) (v : α →₀ M) (a : α) : embDomain f v (f a) = v a := by
classical
simp_rw [embDomain, coe_mk, mem_map']
split_ifs with h
· refine congr_arg (v : α → M) (f.inj' ?_)
exact Finset.choose_property (fun a₁ => f a₁ = f a) _ _
· exact (not_mem_support_iff.1 h).symm
theorem embDomain_notin_range (f : α ↪ β) (v : α →₀ M) (a : β) (h : a ∉ Set.range f) :
embDomain f v a = 0 := by
classical
refine dif_neg (mt (fun h => ?_) h)
rcases Finset.mem_map.1 h with ⟨a, _h, rfl⟩
exact Set.mem_range_self a
theorem embDomain_injective (f : α ↪ β) : Function.Injective (embDomain f : (α →₀ M) → β →₀ M) :=
fun l₁ l₂ h => ext fun a => by simpa only [embDomain_apply] using DFunLike.ext_iff.1 h (f a)
@[simp]
theorem embDomain_inj {f : α ↪ β} {l₁ l₂ : α →₀ M} : embDomain f l₁ = embDomain f l₂ ↔ l₁ = l₂ :=
(embDomain_injective f).eq_iff
@[simp]
theorem embDomain_eq_zero {f : α ↪ β} {l : α →₀ M} : embDomain f l = 0 ↔ l = 0 :=
(embDomain_injective f).eq_iff' <| embDomain_zero f
theorem embDomain_mapRange (f : α ↪ β) (g : M → N) (p : α →₀ M) (hg : g 0 = 0) :
embDomain f (mapRange g hg p) = mapRange g hg (embDomain f p) := by
ext a
by_cases h : a ∈ Set.range f
· rcases h with ⟨a', rfl⟩
rw [mapRange_apply, embDomain_apply, embDomain_apply, mapRange_apply]
· rw [mapRange_apply, embDomain_notin_range, embDomain_notin_range, ← hg] <;> assumption
end EmbDomain
/-! ### Declarations about `zipWith` -/
section ZipWith
variable [Zero M] [Zero N] [Zero P]
/-- Given finitely supported functions `g₁ : α →₀ M` and `g₂ : α →₀ N` and function `f : M → N → P`,
`Finsupp.zipWith f hf g₁ g₂` is the finitely supported function `α →₀ P` satisfying
`zipWith f hf g₁ g₂ a = f (g₁ a) (g₂ a)`, which is well-defined when `f 0 0 = 0`. -/
def zipWith (f : M → N → P) (hf : f 0 0 = 0) (g₁ : α →₀ M) (g₂ : α →₀ N) : α →₀ P :=
onFinset
(haveI := Classical.decEq α; g₁.support ∪ g₂.support)
(fun a => f (g₁ a) (g₂ a))
fun a (H : f _ _ ≠ 0) => by
classical
rw [mem_union, mem_support_iff, mem_support_iff, ← not_and_or]
rintro ⟨h₁, h₂⟩; rw [h₁, h₂] at H; exact H hf
@[simp]
theorem zipWith_apply {f : M → N → P} {hf : f 0 0 = 0} {g₁ : α →₀ M} {g₂ : α →₀ N} {a : α} :
zipWith f hf g₁ g₂ a = f (g₁ a) (g₂ a) :=
rfl
theorem support_zipWith [D : DecidableEq α] {f : M → N → P} {hf : f 0 0 = 0} {g₁ : α →₀ M}
{g₂ : α →₀ N} : (zipWith f hf g₁ g₂).support ⊆ g₁.support ∪ g₂.support := by
convert support_onFinset_subset
end ZipWith
/-! ### Additive monoid structure on `α →₀ M` -/
section AddZeroClass
variable [AddZeroClass M]
instance instAdd : Add (α →₀ M) :=
⟨zipWith (· + ·) (add_zero 0)⟩
@[simp, norm_cast] lemma coe_add (f g : α →₀ M) : ⇑(f + g) = f + g := rfl
theorem add_apply (g₁ g₂ : α →₀ M) (a : α) : (g₁ + g₂) a = g₁ a + g₂ a :=
rfl
theorem support_add [DecidableEq α] {g₁ g₂ : α →₀ M} :
(g₁ + g₂).support ⊆ g₁.support ∪ g₂.support :=
support_zipWith
theorem support_add_eq [DecidableEq α] {g₁ g₂ : α →₀ M} (h : Disjoint g₁.support g₂.support) :
(g₁ + g₂).support = g₁.support ∪ g₂.support :=
le_antisymm support_zipWith fun a ha =>
(Finset.mem_union.1 ha).elim
(fun ha => by
have : a ∉ g₂.support := disjoint_left.1 h ha
simp only [mem_support_iff, not_not] at *; simpa only [add_apply, this, add_zero] )
fun ha => by
have : a ∉ g₁.support := disjoint_right.1 h ha
simp only [mem_support_iff, not_not] at *; simpa only [add_apply, this, zero_add]
instance instAddZeroClass : AddZeroClass (α →₀ M) :=
fast_instance% DFunLike.coe_injective.addZeroClass _ coe_zero coe_add
instance instIsLeftCancelAdd [IsLeftCancelAdd M] : IsLeftCancelAdd (α →₀ M) where
add_left_cancel _ _ _ h := ext fun x => add_left_cancel <| DFunLike.congr_fun h x
/-- When ι is finite and M is an AddMonoid,
then Finsupp.equivFunOnFinite gives an AddEquiv -/
noncomputable def addEquivFunOnFinite {ι : Type*} [Finite ι] :
(ι →₀ M) ≃+ (ι → M) where
__ := Finsupp.equivFunOnFinite
map_add' _ _ := rfl
/-- AddEquiv between (ι →₀ M) and M, when ι has a unique element -/
noncomputable def _root_.AddEquiv.finsuppUnique {ι : Type*} [Unique ι] :
(ι →₀ M) ≃+ M where
__ := Equiv.finsuppUnique
map_add' _ _ := rfl
instance instIsRightCancelAdd [IsRightCancelAdd M] : IsRightCancelAdd (α →₀ M) where
add_right_cancel _ _ _ h := ext fun x => add_right_cancel <| DFunLike.congr_fun h x
instance instIsCancelAdd [IsCancelAdd M] : IsCancelAdd (α →₀ M) where
/-- Evaluation of a function `f : α →₀ M` at a point as an additive monoid homomorphism.
See `Finsupp.lapply` in `Mathlib/LinearAlgebra/Finsupp/Defs.lean` for the stronger version as a
linear map. -/
@[simps apply]
def applyAddHom (a : α) : (α →₀ M) →+ M where
toFun g := g a
map_zero' := zero_apply
map_add' _ _ := add_apply _ _ _
/-- Coercion from a `Finsupp` to a function type is an `AddMonoidHom`. -/
@[simps]
noncomputable def coeFnAddHom : (α →₀ M) →+ α → M where
toFun := (⇑)
map_zero' := coe_zero
map_add' := coe_add
theorem mapRange_add [AddZeroClass N] {f : M → N} {hf : f 0 = 0}
(hf' : ∀ x y, f (x + y) = f x + f y) (v₁ v₂ : α →₀ M) :
mapRange f hf (v₁ + v₂) = mapRange f hf v₁ + mapRange f hf v₂ :=
ext fun _ => by simp only [hf', add_apply, mapRange_apply]
theorem mapRange_add' [AddZeroClass N] [FunLike β M N] [AddMonoidHomClass β M N]
{f : β} (v₁ v₂ : α →₀ M) :
mapRange f (map_zero f) (v₁ + v₂) = mapRange f (map_zero f) v₁ + mapRange f (map_zero f) v₂ :=
mapRange_add (map_add f) v₁ v₂
/-- Bundle `Finsupp.embDomain f` as an additive map from `α →₀ M` to `β →₀ M`. -/
@[simps]
def embDomain.addMonoidHom (f : α ↪ β) : (α →₀ M) →+ β →₀ M where
toFun v := embDomain f v
map_zero' := by simp
map_add' v w := by
ext b
by_cases h : b ∈ Set.range f
· rcases h with ⟨a, rfl⟩
simp
· simp only [Set.mem_range, not_exists, coe_add, Pi.add_apply,
embDomain_notin_range _ _ _ h, add_zero]
@[simp]
theorem embDomain_add (f : α ↪ β) (v w : α →₀ M) :
embDomain f (v + w) = embDomain f v + embDomain f w :=
(embDomain.addMonoidHom f).map_add v w
end AddZeroClass
section AddMonoid
variable [AddMonoid M]
/-- Note the general `SMul` instance for `Finsupp` doesn't apply as `ℕ` is not distributive
unless `β i`'s addition is commutative. -/
instance instNatSMul : SMul ℕ (α →₀ M) :=
⟨fun n v => v.mapRange (n • ·) (nsmul_zero _)⟩
instance instAddMonoid : AddMonoid (α →₀ M) :=
fast_instance% DFunLike.coe_injective.addMonoid _ coe_zero coe_add fun _ _ => rfl
end AddMonoid
instance instAddCommMonoid [AddCommMonoid M] : AddCommMonoid (α →₀ M) :=
fast_instance% DFunLike.coe_injective.addCommMonoid
DFunLike.coe coe_zero coe_add (fun _ _ => rfl)
instance instNeg [NegZeroClass G] : Neg (α →₀ G) :=
⟨mapRange Neg.neg neg_zero⟩
@[simp, norm_cast] lemma coe_neg [NegZeroClass G] (g : α →₀ G) : ⇑(-g) = -g := rfl
theorem neg_apply [NegZeroClass G] (g : α →₀ G) (a : α) : (-g) a = -g a :=
rfl
theorem mapRange_neg [NegZeroClass G] [NegZeroClass H] {f : G → H} {hf : f 0 = 0}
(hf' : ∀ x, f (-x) = -f x) (v : α →₀ G) : mapRange f hf (-v) = -mapRange f hf v :=
ext fun _ => by simp only [hf', neg_apply, mapRange_apply]
theorem mapRange_neg' [AddGroup G] [SubtractionMonoid H] [FunLike β G H] [AddMonoidHomClass β G H]
{f : β} (v : α →₀ G) :
mapRange f (map_zero f) (-v) = -mapRange f (map_zero f) v :=
mapRange_neg (map_neg f) v
instance instSub [SubNegZeroMonoid G] : Sub (α →₀ G) :=
⟨zipWith Sub.sub (sub_zero _)⟩
@[simp, norm_cast] lemma coe_sub [SubNegZeroMonoid G] (g₁ g₂ : α →₀ G) : ⇑(g₁ - g₂) = g₁ - g₂ := rfl
theorem sub_apply [SubNegZeroMonoid G] (g₁ g₂ : α →₀ G) (a : α) : (g₁ - g₂) a = g₁ a - g₂ a :=
rfl
theorem mapRange_sub [SubNegZeroMonoid G] [SubNegZeroMonoid H] {f : G → H} {hf : f 0 = 0}
(hf' : ∀ x y, f (x - y) = f x - f y) (v₁ v₂ : α →₀ G) :
mapRange f hf (v₁ - v₂) = mapRange f hf v₁ - mapRange f hf v₂ :=
ext fun _ => by simp only [hf', sub_apply, mapRange_apply]
theorem mapRange_sub' [AddGroup G] [SubtractionMonoid H] [FunLike β G H] [AddMonoidHomClass β G H]
{f : β} (v₁ v₂ : α →₀ G) :
mapRange f (map_zero f) (v₁ - v₂) = mapRange f (map_zero f) v₁ - mapRange f (map_zero f) v₂ :=
mapRange_sub (map_sub f) v₁ v₂
/-- Note the general `SMul` instance for `Finsupp` doesn't apply as `ℤ` is not distributive
unless `β i`'s addition is commutative. -/
instance instIntSMul [AddGroup G] : SMul ℤ (α →₀ G) :=
⟨fun n v => v.mapRange (n • ·) (zsmul_zero _)⟩
instance instAddGroup [AddGroup G] : AddGroup (α →₀ G) :=
fast_instance% DFunLike.coe_injective.addGroup DFunLike.coe coe_zero coe_add coe_neg coe_sub
(fun _ _ => rfl) fun _ _ => rfl
instance instAddCommGroup [AddCommGroup G] : AddCommGroup (α →₀ G) :=
fast_instance% DFunLike.coe_injective.addCommGroup DFunLike.coe coe_zero coe_add coe_neg coe_sub
(fun _ _ => rfl) fun _ _ => rfl
@[simp]
theorem support_neg [AddGroup G] (f : α →₀ G) : support (-f) = support f :=
Finset.Subset.antisymm support_mapRange
(calc
support f = support (- -f) := congr_arg support (neg_neg _).symm
_ ⊆ support (-f) := support_mapRange
)
theorem support_sub [DecidableEq α] [AddGroup G] {f g : α →₀ G} :
support (f - g) ⊆ support f ∪ support g := by
rw [sub_eq_add_neg, ← support_neg g]
exact support_add
end Finsupp
| Mathlib/Data/Finsupp/Defs.lean | 650 | 651 | |
/-
Copyright (c) 2020 Kenny Lau. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Kenny Lau, Ken Lee, Chris Hughes
-/
import Mathlib.Algebra.BigOperators.Ring.Finset
import Mathlib.Data.Fintype.Basic
import Mathlib.Data.Int.GCD
import Mathlib.RingTheory.Coprime.Basic
/-!
# Additional lemmas about elements of a ring satisfying `IsCoprime`
and elements of a monoid satisfying `IsRelPrime`
These lemmas are in a separate file to the definition of `IsCoprime` or `IsRelPrime`
as they require more imports.
Notably, this includes lemmas about `Finset.prod` as this requires importing BigOperators, and
lemmas about `Pow` since these are easiest to prove via `Finset.prod`.
-/
universe u v
open scoped Function -- required for scoped `on` notation
section IsCoprime
variable {R : Type u} {I : Type v} [CommSemiring R] {x y z : R} {s : I → R} {t : Finset I}
section
theorem Int.isCoprime_iff_gcd_eq_one {m n : ℤ} : IsCoprime m n ↔ Int.gcd m n = 1 := by
constructor
· rintro ⟨a, b, h⟩
refine Nat.dvd_one.mp (Int.gcd_dvd_iff.mpr ⟨a, b, ?_⟩)
rwa [mul_comm m, mul_comm n, eq_comm]
· rw [← Int.ofNat_inj, IsCoprime, Int.gcd_eq_gcd_ab, mul_comm m, mul_comm n, Nat.cast_one]
intro h
exact ⟨_, _, h⟩
theorem Nat.isCoprime_iff_coprime {m n : ℕ} : IsCoprime (m : ℤ) n ↔ Nat.Coprime m n := by
rw [Int.isCoprime_iff_gcd_eq_one, Int.gcd_natCast_natCast]
alias ⟨IsCoprime.nat_coprime, Nat.Coprime.isCoprime⟩ := Nat.isCoprime_iff_coprime
theorem Nat.Coprime.cast {R : Type*} [CommRing R] {a b : ℕ} (h : Nat.Coprime a b) :
IsCoprime (a : R) (b : R) := by
rw [← isCoprime_iff_coprime] at h
rw [← Int.cast_natCast a, ← Int.cast_natCast b]
exact IsCoprime.intCast h
theorem ne_zero_or_ne_zero_of_nat_coprime {A : Type u} [CommRing A] [Nontrivial A] {a b : ℕ}
(h : Nat.Coprime a b) : (a : A) ≠ 0 ∨ (b : A) ≠ 0 :=
IsCoprime.ne_zero_or_ne_zero (R := A) <| by
simpa only [map_natCast] using IsCoprime.map (Nat.Coprime.isCoprime h) (Int.castRingHom A)
theorem IsCoprime.prod_left : (∀ i ∈ t, IsCoprime (s i) x) → IsCoprime (∏ i ∈ t, s i) x := by
classical
refine Finset.induction_on t (fun _ ↦ isCoprime_one_left) fun b t hbt ih H ↦ ?_
rw [Finset.prod_insert hbt]
rw [Finset.forall_mem_insert] at H
exact H.1.mul_left (ih H.2)
theorem IsCoprime.prod_right : (∀ i ∈ t, IsCoprime x (s i)) → IsCoprime x (∏ i ∈ t, s i) := by
simpa only [isCoprime_comm] using IsCoprime.prod_left (R := R)
theorem IsCoprime.prod_left_iff : IsCoprime (∏ i ∈ t, s i) x ↔ ∀ i ∈ t, IsCoprime (s i) x := by
classical
refine Finset.induction_on t (iff_of_true isCoprime_one_left fun _ ↦ by simp) fun b t hbt ih ↦ ?_
rw [Finset.prod_insert hbt, IsCoprime.mul_left_iff, ih, Finset.forall_mem_insert]
theorem IsCoprime.prod_right_iff : IsCoprime x (∏ i ∈ t, s i) ↔ ∀ i ∈ t, IsCoprime x (s i) := by
simpa only [isCoprime_comm] using IsCoprime.prod_left_iff (R := R)
theorem IsCoprime.of_prod_left (H1 : IsCoprime (∏ i ∈ t, s i) x) (i : I) (hit : i ∈ t) :
IsCoprime (s i) x :=
IsCoprime.prod_left_iff.1 H1 i hit
theorem IsCoprime.of_prod_right (H1 : IsCoprime x (∏ i ∈ t, s i)) (i : I) (hit : i ∈ t) :
IsCoprime x (s i) :=
IsCoprime.prod_right_iff.1 H1 i hit
-- Porting note: removed names of things due to linter, but they seem helpful
theorem Finset.prod_dvd_of_coprime :
(t : Set I).Pairwise (IsCoprime on s) → (∀ i ∈ t, s i ∣ z) → (∏ x ∈ t, s x) ∣ z := by
classical
exact Finset.induction_on t (fun _ _ ↦ one_dvd z)
(by
intro a r har ih Hs Hs1
rw [Finset.prod_insert har]
have aux1 : a ∈ (↑(insert a r) : Set I) := Finset.mem_insert_self a r
refine
(IsCoprime.prod_right fun i hir ↦
Hs aux1 (Finset.mem_insert_of_mem hir) <| by
rintro rfl
exact har hir).mul_dvd
(Hs1 a aux1) (ih (Hs.mono ?_) fun i hi ↦ Hs1 i <| Finset.mem_insert_of_mem hi)
simp only [Finset.coe_insert, Set.subset_insert])
theorem Fintype.prod_dvd_of_coprime [Fintype I] (Hs : Pairwise (IsCoprime on s))
(Hs1 : ∀ i, s i ∣ z) : (∏ x, s x) ∣ z :=
Finset.prod_dvd_of_coprime (Hs.set_pairwise _) fun i _ ↦ Hs1 i
end
open Finset
theorem exists_sum_eq_one_iff_pairwise_coprime [DecidableEq I] (h : t.Nonempty) :
(∃ μ : I → R, (∑ i ∈ t, μ i * ∏ j ∈ t \ {i}, s j) = 1) ↔
Pairwise (IsCoprime on fun i : t ↦ s i) := by
induction h using Finset.Nonempty.cons_induction with
| singleton =>
simp [exists_apply_eq, Pairwise, Function.onFun]
| cons a t hat h ih =>
rw [pairwise_cons']
have mem : ∀ x ∈ t, a ∈ insert a t \ {x} := fun x hx ↦ by
rw [mem_sdiff, mem_singleton]
exact ⟨mem_insert_self _ _, fun ha ↦ hat (ha ▸ hx)⟩
| constructor
· rintro ⟨μ, hμ⟩
rw [sum_cons, cons_eq_insert, sdiff_singleton_eq_erase, erase_insert hat] at hμ
refine ⟨ih.mp ⟨Pi.single h.choose (μ a * s h.choose) + μ * fun _ ↦ s a, ?_⟩, fun b hb ↦ ?_⟩
· rw [prod_eq_mul_prod_diff_singleton h.choose_spec, ← mul_assoc, ←
@if_pos _ _ h.choose_spec R (_ * _) 0, ← sum_pi_single', ← sum_add_distrib] at hμ
rw [← hμ, sum_congr rfl]
intro x hx
dsimp -- Porting note: terms were showing as sort of `HAdd.hadd` instead of `+`
-- this whole proof pretty much breaks and has to be rewritten from scratch
rw [add_mul]
congr 1
· by_cases hx : x = h.choose
· rw [hx, Pi.single_eq_same, Pi.single_eq_same]
· rw [Pi.single_eq_of_ne hx, Pi.single_eq_of_ne hx, zero_mul]
· rw [mul_assoc]
congr
rw [prod_eq_prod_diff_singleton_mul (mem x hx) _, mul_comm]
congr 2
rw [sdiff_sdiff_comm, sdiff_singleton_eq_erase a, erase_insert hat]
· have : IsCoprime (s b) (s a) :=
⟨μ a * ∏ i ∈ t \ {b}, s i, ∑ i ∈ t, μ i * ∏ j ∈ t \ {i}, s j, ?_⟩
· exact ⟨this.symm, this⟩
rw [mul_assoc, ← prod_eq_prod_diff_singleton_mul hb, sum_mul, ← hμ, sum_congr rfl]
intro x hx
rw [mul_assoc]
congr
rw [prod_eq_prod_diff_singleton_mul (mem x hx) _]
congr 2
rw [sdiff_sdiff_comm, sdiff_singleton_eq_erase a, erase_insert hat]
· rintro ⟨hs, Hb⟩
obtain ⟨μ, hμ⟩ := ih.mpr hs
obtain ⟨u, v, huv⟩ := IsCoprime.prod_left fun b hb ↦ (Hb b hb).right
use fun i ↦ if i = a then u else v * μ i
have hμ' : (∑ i ∈ t, v * ((μ i * ∏ j ∈ t \ {i}, s j) * s a)) = v * s a := by
rw [← mul_sum, ← sum_mul, hμ, one_mul]
rw [sum_cons, cons_eq_insert, sdiff_singleton_eq_erase, erase_insert hat]
simp only [↓reduceIte, ite_mul]
rw [← huv, ← hμ', sum_congr rfl]
intro x hx
rw [mul_assoc, if_neg fun ha : x = a ↦ hat (ha.casesOn hx)]
rw [mul_assoc]
congr
rw [prod_eq_prod_diff_singleton_mul (mem x hx) _]
congr 2
rw [sdiff_sdiff_comm, sdiff_singleton_eq_erase a, erase_insert hat]
theorem exists_sum_eq_one_iff_pairwise_coprime' [Fintype I] [Nonempty I] [DecidableEq I] :
(∃ μ : I → R, (∑ i : I, μ i * ∏ j ∈ {i}ᶜ, s j) = 1) ↔ Pairwise (IsCoprime on s) := by
convert exists_sum_eq_one_iff_pairwise_coprime Finset.univ_nonempty (s := s) using 1
simp only [Function.onFun, pairwise_subtype_iff_pairwise_finset', coe_univ, Set.pairwise_univ]
theorem pairwise_coprime_iff_coprime_prod [DecidableEq I] :
Pairwise (IsCoprime on fun i : t ↦ s i) ↔ ∀ i ∈ t, IsCoprime (s i) (∏ j ∈ t \ {i}, s j) := by
refine ⟨fun hp i hi ↦ IsCoprime.prod_right_iff.mpr fun j hj ↦ ?_, fun hp ↦ ?_⟩
· rw [Finset.mem_sdiff, Finset.mem_singleton] at hj
| Mathlib/RingTheory/Coprime/Lemmas.lean | 120 | 175 |
/-
Copyright (c) 2018 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes, Abhimanyu Pallavi Sudhir, Jean Lo, Calle Sönne, Benjamin Davidson
-/
import Mathlib.Algebra.QuadraticDiscriminant
import Mathlib.Analysis.SpecialFunctions.Pow.Complex
/-!
# Complex trigonometric functions
Basic facts and derivatives for the complex trigonometric functions.
Several facts about the real trigonometric functions have the proofs deferred here, rather than
`Analysis.SpecialFunctions.Trigonometric.Basic`,
as they are most easily proved by appealing to the corresponding fact for complex trigonometric
functions, or require additional imports which are not available in that file.
-/
noncomputable section
namespace Complex
open Set Filter
open scoped Real
theorem cos_eq_zero_iff {θ : ℂ} : cos θ = 0 ↔ ∃ k : ℤ, θ = (2 * k + 1) * π / 2 := by
have h : (exp (θ * I) + exp (-θ * I)) / 2 = 0 ↔ exp (2 * θ * I) = -1 := by
rw [@div_eq_iff _ _ (exp (θ * I) + exp (-θ * I)) 2 0 two_ne_zero, zero_mul,
add_eq_zero_iff_eq_neg, neg_eq_neg_one_mul, ← div_eq_iff (exp_ne_zero _), ← exp_sub]
ring_nf
rw [cos, h, ← exp_pi_mul_I, exp_eq_exp_iff_exists_int, mul_right_comm]
refine exists_congr fun x => ?_
refine (iff_of_eq <| congr_arg _ ?_).trans (mul_right_inj' <| mul_ne_zero two_ne_zero I_ne_zero)
field_simp; ring
theorem cos_ne_zero_iff {θ : ℂ} : cos θ ≠ 0 ↔ ∀ k : ℤ, θ ≠ (2 * k + 1) * π / 2 := by
rw [← not_exists, not_iff_not, cos_eq_zero_iff]
theorem sin_eq_zero_iff {θ : ℂ} : sin θ = 0 ↔ ∃ k : ℤ, θ = k * π := by
rw [← Complex.cos_sub_pi_div_two, cos_eq_zero_iff]
constructor
· rintro ⟨k, hk⟩
use k + 1
| field_simp [eq_add_of_sub_eq hk]
ring
· rintro ⟨k, rfl⟩
use k - 1
field_simp
ring
theorem sin_ne_zero_iff {θ : ℂ} : sin θ ≠ 0 ↔ ∀ k : ℤ, θ ≠ k * π := by
rw [← not_exists, not_iff_not, sin_eq_zero_iff]
/-- The tangent of a complex number is equal to zero
| Mathlib/Analysis/SpecialFunctions/Trigonometric/Complex.lean | 47 | 57 |
/-
Copyright (c) 2021 Oliver Nash. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Oliver Nash
-/
import Mathlib.Algebra.GroupWithZero.Hom
import Mathlib.Algebra.GroupWithZero.Units.Basic
import Mathlib.Algebra.Ring.Defs
import Mathlib.Data.Nat.Lattice
/-!
# Definition of nilpotent elements
This file defines the notion of a nilpotent element and proves the immediate consequences.
For results that require further theory, see `Mathlib.RingTheory.Nilpotent.Basic`
and `Mathlib.RingTheory.Nilpotent.Lemmas`.
## Main definitions
* `IsNilpotent`
* `Commute.isNilpotent_mul_left`
* `Commute.isNilpotent_mul_right`
* `nilpotencyClass`
-/
universe u v
open Function Set
variable {R S : Type*} {x y : R}
/-- An element is said to be nilpotent if some natural-number-power of it equals zero.
Note that we require only the bare minimum assumptions for the definition to make sense. Even
`MonoidWithZero` is too strong since nilpotency is important in the study of rings that are only
power-associative. -/
def IsNilpotent [Zero R] [Pow R ℕ] (x : R) : Prop :=
∃ n : ℕ, x ^ n = 0
theorem IsNilpotent.mk [Zero R] [Pow R ℕ] (x : R) (n : ℕ) (e : x ^ n = 0) : IsNilpotent x :=
⟨n, e⟩
@[simp] lemma isNilpotent_of_subsingleton [Zero R] [Pow R ℕ] [Subsingleton R] : IsNilpotent x :=
⟨0, Subsingleton.elim _ _⟩
@[simp] theorem IsNilpotent.zero [MonoidWithZero R] : IsNilpotent (0 : R) :=
⟨1, pow_one 0⟩
theorem not_isNilpotent_one [MonoidWithZero R] [Nontrivial R] :
¬ IsNilpotent (1 : R) := fun ⟨_, H⟩ ↦ zero_ne_one (H.symm.trans (one_pow _))
lemma IsNilpotent.pow_succ (n : ℕ) {S : Type*} [MonoidWithZero S] {x : S}
(hx : IsNilpotent x) : IsNilpotent (x ^ n.succ) := by
obtain ⟨N, hN⟩ := hx
use N
rw [← pow_mul, Nat.succ_mul, pow_add, hN, mul_zero]
theorem IsNilpotent.of_pow [MonoidWithZero R] {x : R} {m : ℕ}
(h : IsNilpotent (x ^ m)) : IsNilpotent x := by
obtain ⟨n, h⟩ := h
use m * n
rw [← h, pow_mul x m n]
lemma IsNilpotent.pow_of_pos {n} {S : Type*} [MonoidWithZero S] {x : S}
(hx : IsNilpotent x) (hn : n ≠ 0) : IsNilpotent (x ^ n) := by
cases n with
| zero => contradiction
| succ => exact IsNilpotent.pow_succ _ hx
@[simp]
lemma IsNilpotent.pow_iff_pos {n} {S : Type*} [MonoidWithZero S] {x : S} (hn : n ≠ 0) :
IsNilpotent (x ^ n) ↔ IsNilpotent x :=
⟨of_pow, (pow_of_pos · hn)⟩
theorem IsNilpotent.map [MonoidWithZero R] [MonoidWithZero S] {r : R} {F : Type*}
[FunLike F R S] [MonoidWithZeroHomClass F R S] (hr : IsNilpotent r) (f : F) :
IsNilpotent (f r) := by
use hr.choose
rw [← map_pow, hr.choose_spec, map_zero]
lemma IsNilpotent.map_iff [MonoidWithZero R] [MonoidWithZero S] {r : R} {F : Type*}
[FunLike F R S] [MonoidWithZeroHomClass F R S] {f : F} (hf : Function.Injective f) :
IsNilpotent (f r) ↔ IsNilpotent r :=
⟨fun ⟨k, hk⟩ ↦ ⟨k, (map_eq_zero_iff f hf).mp <| by rwa [map_pow]⟩, fun h ↦ h.map f⟩
theorem IsUnit.isNilpotent_mul_unit_of_commute_iff [MonoidWithZero R] {r u : R}
(hu : IsUnit u) (h_comm : Commute r u) :
IsNilpotent (r * u) ↔ IsNilpotent r :=
exists_congr fun n ↦ by rw [h_comm.mul_pow, (hu.pow n).mul_left_eq_zero]
theorem IsUnit.isNilpotent_unit_mul_of_commute_iff [MonoidWithZero R] {r u : R}
(hu : IsUnit u) (h_comm : Commute r u) :
IsNilpotent (u * r) ↔ IsNilpotent r :=
h_comm ▸ hu.isNilpotent_mul_unit_of_commute_iff h_comm
section NilpotencyClass
section ZeroPow
variable [Zero R] [Pow R ℕ]
variable (x) in
/-- If `x` is nilpotent, the nilpotency class is the smallest natural number `k` such that
`x ^ k = 0`. If `x` is not nilpotent, the nilpotency class takes the junk value `0`. -/
noncomputable def nilpotencyClass : ℕ := sInf {k | x ^ k = 0}
@[simp] lemma nilpotencyClass_eq_zero_of_subsingleton [Subsingleton R] :
nilpotencyClass x = 0 := by
let s : Set ℕ := {k | x ^ k = 0}
suffices s = univ by change sInf _ = 0; simp [s] at this; simp [this]
exact eq_univ_iff_forall.mpr fun k ↦ Subsingleton.elim _ _
lemma isNilpotent_of_pos_nilpotencyClass (hx : 0 < nilpotencyClass x) :
IsNilpotent x := by
let s : Set ℕ := {k | x ^ k = 0}
change s.Nonempty
change 0 < sInf s at hx
by_contra contra
simp [not_nonempty_iff_eq_empty.mp contra] at hx
lemma pow_nilpotencyClass (hx : IsNilpotent x) : x ^ (nilpotencyClass x) = 0 :=
Nat.sInf_mem hx
end ZeroPow
section MonoidWithZero
variable [MonoidWithZero R]
lemma nilpotencyClass_eq_succ_iff {k : ℕ} :
nilpotencyClass x = k + 1 ↔ x ^ (k + 1) = 0 ∧ x ^ k ≠ 0 := by
let s : Set ℕ := {k | x ^ k = 0}
have : ∀ k₁ k₂ : ℕ, k₁ ≤ k₂ → k₁ ∈ s → k₂ ∈ s := fun k₁ k₂ h_le hk₁ ↦ pow_eq_zero_of_le h_le hk₁
simp [s, nilpotencyClass, Nat.sInf_upward_closed_eq_succ_iff this]
@[simp] lemma nilpotencyClass_zero [Nontrivial R] :
nilpotencyClass (0 : R) = 1 :=
nilpotencyClass_eq_succ_iff.mpr <| by constructor <;> simp
@[simp] lemma pos_nilpotencyClass_iff [Nontrivial R] :
0 < nilpotencyClass x ↔ IsNilpotent x := by
| refine ⟨isNilpotent_of_pos_nilpotencyClass, fun hx ↦ Nat.pos_of_ne_zero fun hx' ↦ ?_⟩
replace hx := pow_nilpotencyClass hx
rw [hx', pow_zero] at hx
| Mathlib/RingTheory/Nilpotent/Defs.lean | 143 | 145 |
/-
Copyright (c) 2021 Shing Tak Lam. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Shing Tak Lam
-/
import Mathlib.LinearAlgebra.GeneralLinearGroup
import Mathlib.LinearAlgebra.Matrix.ToLin
import Mathlib.LinearAlgebra.Matrix.NonsingularInverse
import Mathlib.Algebra.Star.Unitary
/-!
# The Unitary Group
This file defines elements of the unitary group `Matrix.unitaryGroup n α`, where `α` is a
`StarRing`. This consists of all `n` by `n` matrices with entries in `α` such that the
star-transpose is its inverse. In addition, we define the group structure on
`Matrix.unitaryGroup n α`, and the embedding into the general linear group
`LinearMap.GeneralLinearGroup α (n → α)`.
We also define the orthogonal group `Matrix.orthogonalGroup n β`, where `β` is a `CommRing`.
## Main Definitions
* `Matrix.unitaryGroup` is the submonoid of matrices where the star-transpose is the inverse; the
group structure (under multiplication) is inherited from a more general `unitary` construction.
* `Matrix.UnitaryGroup.embeddingGL` is the embedding `Matrix.unitaryGroup n α → GLₙ(α)`, where
`GLₙ(α)` is `LinearMap.GeneralLinearGroup α (n → α)`.
* `Matrix.orthogonalGroup` is the submonoid of matrices where the transpose is the inverse.
## References
* https://en.wikipedia.org/wiki/Unitary_group
## Tags
matrix group, group, unitary group, orthogonal group
-/
universe u v
namespace Matrix
open LinearMap Matrix
section
variable (n : Type u) [DecidableEq n] [Fintype n]
variable (α : Type v) [CommRing α] [StarRing α]
/-- `Matrix.unitaryGroup n` is the group of `n` by `n` matrices where the star-transpose is the
inverse.
-/
abbrev unitaryGroup :=
unitary (Matrix n n α)
end
variable {n : Type u} [DecidableEq n] [Fintype n]
variable {α : Type v} [CommRing α] [StarRing α] {A : Matrix n n α}
theorem mem_unitaryGroup_iff : A ∈ Matrix.unitaryGroup n α ↔ A * star A = 1 := by
refine ⟨And.right, fun hA => ⟨?_, hA⟩⟩
simpa only [mul_eq_one_comm] using hA
theorem mem_unitaryGroup_iff' : A ∈ Matrix.unitaryGroup n α ↔ star A * A = 1 := by
refine ⟨And.left, fun hA => ⟨hA, ?_⟩⟩
rwa [mul_eq_one_comm] at hA
theorem det_of_mem_unitary {A : Matrix n n α} (hA : A ∈ Matrix.unitaryGroup n α) :
A.det ∈ unitary α := by
constructor
· simpa [star, det_transpose] using congr_arg det hA.1
· simpa [star, det_transpose] using congr_arg det hA.2
namespace UnitaryGroup
instance coeMatrix : Coe (unitaryGroup n α) (Matrix n n α) :=
⟨Subtype.val⟩
instance coeFun : CoeFun (unitaryGroup n α) fun _ => n → n → α where coe A := A.val
/-- `Matrix.UnitaryGroup.toLin' A` is matrix multiplication of vectors by `A`, as a linear map.
After the group structure on `Matrix.unitaryGroup n` is defined, we show in
`Matrix.UnitaryGroup.toLinearEquiv` that this gives a linear equivalence.
-/
def toLin' (A : unitaryGroup n α) :=
Matrix.toLin' A.1
theorem ext_iff (A B : unitaryGroup n α) : A = B ↔ ∀ i j, A i j = B i j :=
Subtype.ext_iff_val.trans ⟨fun h i j => congr_fun (congr_fun h i) j, Matrix.ext⟩
@[ext]
theorem ext (A B : unitaryGroup n α) : (∀ i j, A i j = B i j) → A = B :=
(UnitaryGroup.ext_iff A B).mpr
theorem star_mul_self (A : unitaryGroup n α) : star A.1 * A.1 = 1 :=
A.2.1
@[simp]
theorem det_isUnit (A : unitaryGroup n α) : IsUnit (A : Matrix n n α).det :=
isUnit_iff_isUnit_det _ |>.mp <| (unitary.toUnits A).isUnit
section CoeLemmas
variable (A B : unitaryGroup n α)
@[simp] theorem inv_val : ↑A⁻¹ = (star A : Matrix n n α) := rfl
@[simp] theorem inv_apply : ⇑A⁻¹ = (star A : Matrix n n α) := rfl
@[simp] theorem mul_val : ↑(A * B) = A.1 * B.1 := rfl
@[simp] theorem mul_apply : ⇑(A * B) = A.1 * B.1 := rfl
@[simp] theorem one_val : ↑(1 : unitaryGroup n α) = (1 : Matrix n n α) := rfl
@[simp] theorem one_apply : ⇑(1 : unitaryGroup n α) = (1 : Matrix n n α) := rfl
@[simp]
theorem toLin'_mul : toLin' (A * B) = (toLin' A).comp (toLin' B) :=
Matrix.toLin'_mul A.1 B.1
@[simp]
theorem toLin'_one : toLin' (1 : unitaryGroup n α) = LinearMap.id :=
Matrix.toLin'_one
end CoeLemmas
-- TODO: redefine `toGL`/`embeddingGL` as in the following example,
-- so that we can get `toLinearEquiv` from `GeneralLinearGroup.toLinearEquiv`
example : unitaryGroup n α →* GeneralLinearGroup α (n → α) :=
.toHomUnits ⟨⟨toLin', toLin'_one⟩, toLin'_mul⟩
/-- `Matrix.unitaryGroup.toLinearEquiv A` is matrix multiplication of vectors by `A`, as a linear
equivalence. -/
def toLinearEquiv (A : unitaryGroup n α) : (n → α) ≃ₗ[α] n → α :=
{ Matrix.toLin' A.1 with
invFun := toLin' A⁻¹
left_inv := fun x =>
calc
(toLin' A⁻¹).comp (toLin' A) x = (toLin' (A⁻¹ * A)) x := by rw [← toLin'_mul]
_ = x := by rw [inv_mul_cancel, toLin'_one, id_apply]
right_inv := fun x =>
calc
(toLin' A).comp (toLin' A⁻¹) x = toLin' (A * A⁻¹) x := by rw [← toLin'_mul]
_ = x := by rw [mul_inv_cancel, toLin'_one, id_apply] }
/-- `Matrix.unitaryGroup.toGL` is the map from the unitary group to the general linear group -/
def toGL (A : unitaryGroup n α) : GeneralLinearGroup α (n → α) :=
GeneralLinearGroup.ofLinearEquiv (toLinearEquiv A)
theorem coe_toGL (A : unitaryGroup n α) : (toGL A).1 = toLin' A := rfl
@[simp]
theorem toGL_one : toGL (1 : unitaryGroup n α) = 1 := Units.ext <| by
simp only [coe_toGL, toLin'_one]
rfl
@[simp]
theorem toGL_mul (A B : unitaryGroup n α) : toGL (A * B) = toGL A * toGL B := Units.ext <| by
simp only [coe_toGL, toLin'_mul]
rfl
/-- `Matrix.unitaryGroup.embeddingGL` is the embedding from `Matrix.unitaryGroup n α` to
`LinearMap.GeneralLinearGroup n α`. -/
def embeddingGL : unitaryGroup n α →* GeneralLinearGroup α (n → α) :=
⟨⟨fun A => toGL A, toGL_one⟩, toGL_mul⟩
end UnitaryGroup
section specialUnitaryGroup
variable (n) (α)
/-- `Matrix.specialUnitaryGroup` is the group of unitary `n` by `n` matrices where the determinant
is 1. (This definition is only correct if 2 is invertible.) -/
abbrev specialUnitaryGroup := unitaryGroup n α ⊓ MonoidHom.mker detMonoidHom
variable {n} {α}
theorem mem_specialUnitaryGroup_iff :
A ∈ specialUnitaryGroup n α ↔ A ∈ unitaryGroup n α ∧ A.det = 1 :=
Iff.rfl
end specialUnitaryGroup
section OrthogonalGroup
variable (n) (β : Type v) [CommRing β]
-- TODO: will lemmas about `Matrix.orthogonalGroup` work without making
-- `starRingOfComm` a local instance? E.g., can we talk about unitary group and orthogonal group
-- at the same time?
attribute [local instance] starRingOfComm
/-- `Matrix.orthogonalGroup n` is the group of `n` by `n` matrices where the transpose is the
inverse. -/
abbrev orthogonalGroup := unitaryGroup n β
theorem mem_orthogonalGroup_iff {A : Matrix n n β} :
A ∈ Matrix.orthogonalGroup n β ↔ A * star A = 1 := by
refine ⟨And.right, fun hA => ⟨?_, hA⟩⟩
simpa only [mul_eq_one_comm] using hA
theorem mem_orthogonalGroup_iff' {A : Matrix n n β} :
A ∈ Matrix.orthogonalGroup n β ↔ star A * A = 1 := by
refine ⟨And.left, fun hA => ⟨hA, ?_⟩⟩
rwa [mul_eq_one_comm] at hA
end OrthogonalGroup
section specialOrthogonalGroup
variable (n) (β : Type v) [CommRing β]
attribute [local instance] starRingOfComm
/-- `Matrix.specialOrthogonalGroup n` is the group of orthogonal `n` by `n` where the determinant
is one. (This definition is only correct if 2 is invertible.) -/
abbrev specialOrthogonalGroup := specialUnitaryGroup n β
variable {n} {β} {A : Matrix n n β}
theorem mem_specialOrthogonalGroup_iff :
A ∈ specialOrthogonalGroup n β ↔ A ∈ orthogonalGroup n β ∧ A.det = 1 :=
Iff.rfl
end specialOrthogonalGroup
end Matrix
| Mathlib/LinearAlgebra/UnitaryGroup.lean | 241 | 244 | |
/-
Copyright (c) 2022 Damiano Testa. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Damiano Testa, Yuyang Zhao
-/
import Mathlib.Algebra.Order.GroupWithZero.Unbundled.Basic
import Mathlib.Algebra.Order.GroupWithZero.Unbundled.Defs
import Mathlib.Tactic.Linter.DeprecatedModule
deprecated_module (since := "2025-04-13")
| Mathlib/Algebra/Order/GroupWithZero/Unbundled.lean | 748 | 749 | |
/-
Copyright (c) 2022 Violeta Hernández Palacios. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Violeta Hernández Palacios
-/
import Mathlib.Order.RelClasses
import Mathlib.Order.Interval.Set.Basic
/-!
# Bounded and unbounded sets
We prove miscellaneous lemmas about bounded and unbounded sets. Many of these are just variations on
the same ideas, or similar results with a few minor differences. The file is divided into these
different general ideas.
-/
assert_not_exists RelIso
namespace Set
variable {α : Type*} {r : α → α → Prop} {s t : Set α}
/-! ### Subsets of bounded and unbounded sets -/
theorem Bounded.mono (hst : s ⊆ t) (hs : Bounded r t) : Bounded r s :=
hs.imp fun _ ha b hb => ha b (hst hb)
theorem Unbounded.mono (hst : s ⊆ t) (hs : Unbounded r s) : Unbounded r t := fun a =>
let ⟨b, hb, hb'⟩ := hs a
⟨b, hst hb, hb'⟩
/-! ### Alternate characterizations of unboundedness on orders -/
theorem unbounded_le_of_forall_exists_lt [Preorder α] (h : ∀ a, ∃ b ∈ s, a < b) :
Unbounded (· ≤ ·) s := fun a =>
let ⟨b, hb, hb'⟩ := h a
⟨b, hb, fun hba => hba.not_lt hb'⟩
theorem unbounded_le_iff [LinearOrder α] : Unbounded (· ≤ ·) s ↔ ∀ a, ∃ b ∈ s, a < b := by
simp only [Unbounded, not_le]
theorem unbounded_lt_of_forall_exists_le [Preorder α] (h : ∀ a, ∃ b ∈ s, a ≤ b) :
Unbounded (· < ·) s := fun a =>
let ⟨b, hb, hb'⟩ := h a
⟨b, hb, fun hba => hba.not_le hb'⟩
theorem unbounded_lt_iff [LinearOrder α] : Unbounded (· < ·) s ↔ ∀ a, ∃ b ∈ s, a ≤ b := by
simp only [Unbounded, not_lt]
theorem unbounded_ge_of_forall_exists_gt [Preorder α] (h : ∀ a, ∃ b ∈ s, b < a) :
Unbounded (· ≥ ·) s :=
@unbounded_le_of_forall_exists_lt αᵒᵈ _ _ h
theorem unbounded_ge_iff [LinearOrder α] : Unbounded (· ≥ ·) s ↔ ∀ a, ∃ b ∈ s, b < a :=
⟨fun h a =>
let ⟨b, hb, hba⟩ := h a
⟨b, hb, lt_of_not_ge hba⟩,
unbounded_ge_of_forall_exists_gt⟩
theorem unbounded_gt_of_forall_exists_ge [Preorder α] (h : ∀ a, ∃ b ∈ s, b ≤ a) :
Unbounded (· > ·) s := fun a =>
let ⟨b, hb, hb'⟩ := h a
⟨b, hb, fun hba => not_le_of_gt hba hb'⟩
theorem unbounded_gt_iff [LinearOrder α] : Unbounded (· > ·) s ↔ ∀ a, ∃ b ∈ s, b ≤ a :=
⟨fun h a =>
let ⟨b, hb, hba⟩ := h a
⟨b, hb, le_of_not_gt hba⟩,
unbounded_gt_of_forall_exists_ge⟩
/-! ### Relation between boundedness by strict and nonstrict orders. -/
/-! #### Less and less or equal -/
theorem Bounded.rel_mono {r' : α → α → Prop} (h : Bounded r s) (hrr' : r ≤ r') : Bounded r' s :=
let ⟨a, ha⟩ := h
⟨a, fun b hb => hrr' b a (ha b hb)⟩
theorem bounded_le_of_bounded_lt [Preorder α] (h : Bounded (· < ·) s) : Bounded (· ≤ ·) s :=
h.rel_mono fun _ _ => le_of_lt
theorem Unbounded.rel_mono {r' : α → α → Prop} (hr : r' ≤ r) (h : Unbounded r s) : Unbounded r' s :=
fun a =>
let ⟨b, hb, hba⟩ := h a
⟨b, hb, fun hba' => hba (hr b a hba')⟩
theorem unbounded_lt_of_unbounded_le [Preorder α] (h : Unbounded (· ≤ ·) s) : Unbounded (· < ·) s :=
h.rel_mono fun _ _ => le_of_lt
theorem bounded_le_iff_bounded_lt [Preorder α] [NoMaxOrder α] :
Bounded (· ≤ ·) s ↔ Bounded (· < ·) s := by
refine ⟨fun h => ?_, bounded_le_of_bounded_lt⟩
obtain ⟨a, ha⟩ := h
obtain ⟨b, hb⟩ := exists_gt a
exact ⟨b, fun c hc => lt_of_le_of_lt (ha c hc) hb⟩
theorem unbounded_lt_iff_unbounded_le [Preorder α] [NoMaxOrder α] :
Unbounded (· < ·) s ↔ Unbounded (· ≤ ·) s := by
simp_rw [← not_bounded_iff, bounded_le_iff_bounded_lt]
/-! #### Greater and greater or equal -/
theorem bounded_ge_of_bounded_gt [Preorder α] (h : Bounded (· > ·) s) : Bounded (· ≥ ·) s :=
let ⟨a, ha⟩ := h
⟨a, fun b hb => le_of_lt (ha b hb)⟩
theorem unbounded_gt_of_unbounded_ge [Preorder α] (h : Unbounded (· ≥ ·) s) : Unbounded (· > ·) s :=
fun a =>
let ⟨b, hb, hba⟩ := h a
⟨b, hb, fun hba' => hba (le_of_lt hba')⟩
theorem bounded_ge_iff_bounded_gt [Preorder α] [NoMinOrder α] :
Bounded (· ≥ ·) s ↔ Bounded (· > ·) s :=
@bounded_le_iff_bounded_lt αᵒᵈ _ _ _
theorem unbounded_gt_iff_unbounded_ge [Preorder α] [NoMinOrder α] :
Unbounded (· > ·) s ↔ Unbounded (· ≥ ·) s :=
@unbounded_lt_iff_unbounded_le αᵒᵈ _ _ _
/-! ### The universal set -/
theorem unbounded_le_univ [LE α] [NoTopOrder α] : Unbounded (· ≤ ·) (@Set.univ α) := fun a =>
let ⟨b, hb⟩ := exists_not_le a
⟨b, ⟨⟩, hb⟩
theorem unbounded_lt_univ [Preorder α] [NoTopOrder α] : Unbounded (· < ·) (@Set.univ α) :=
unbounded_lt_of_unbounded_le unbounded_le_univ
theorem unbounded_ge_univ [LE α] [NoBotOrder α] : Unbounded (· ≥ ·) (@Set.univ α) := fun a =>
let ⟨b, hb⟩ := exists_not_ge a
⟨b, ⟨⟩, hb⟩
theorem unbounded_gt_univ [Preorder α] [NoBotOrder α] : Unbounded (· > ·) (@Set.univ α) :=
unbounded_gt_of_unbounded_ge unbounded_ge_univ
/-! ### Bounded and unbounded intervals -/
theorem bounded_self (a : α) : Bounded r { b | r b a } :=
⟨a, fun _ => id⟩
/-! #### Half-open bounded intervals -/
theorem bounded_lt_Iio [Preorder α] (a : α) : Bounded (· < ·) (Iio a) :=
bounded_self a
theorem bounded_le_Iio [Preorder α] (a : α) : Bounded (· ≤ ·) (Iio a) :=
bounded_le_of_bounded_lt (bounded_lt_Iio a)
theorem bounded_le_Iic [Preorder α] (a : α) : Bounded (· ≤ ·) (Iic a) :=
bounded_self a
theorem bounded_lt_Iic [Preorder α] [NoMaxOrder α] (a : α) : Bounded (· < ·) (Iic a) := by
simp only [← bounded_le_iff_bounded_lt, bounded_le_Iic]
theorem bounded_gt_Ioi [Preorder α] (a : α) : Bounded (· > ·) (Ioi a) :=
bounded_self a
theorem bounded_ge_Ioi [Preorder α] (a : α) : Bounded (· ≥ ·) (Ioi a) :=
bounded_ge_of_bounded_gt (bounded_gt_Ioi a)
theorem bounded_ge_Ici [Preorder α] (a : α) : Bounded (· ≥ ·) (Ici a) :=
bounded_self a
theorem bounded_gt_Ici [Preorder α] [NoMinOrder α] (a : α) : Bounded (· > ·) (Ici a) := by
simp only [← bounded_ge_iff_bounded_gt, bounded_ge_Ici]
/-! #### Other bounded intervals -/
theorem bounded_lt_Ioo [Preorder α] (a b : α) : Bounded (· < ·) (Ioo a b) :=
(bounded_lt_Iio b).mono Set.Ioo_subset_Iio_self
theorem bounded_lt_Ico [Preorder α] (a b : α) : Bounded (· < ·) (Ico a b) :=
(bounded_lt_Iio b).mono Set.Ico_subset_Iio_self
theorem bounded_lt_Ioc [Preorder α] [NoMaxOrder α] (a b : α) : Bounded (· < ·) (Ioc a b) :=
(bounded_lt_Iic b).mono Set.Ioc_subset_Iic_self
theorem bounded_lt_Icc [Preorder α] [NoMaxOrder α] (a b : α) : Bounded (· < ·) (Icc a b) :=
(bounded_lt_Iic b).mono Set.Icc_subset_Iic_self
theorem bounded_le_Ioo [Preorder α] (a b : α) : Bounded (· ≤ ·) (Ioo a b) :=
(bounded_le_Iio b).mono Set.Ioo_subset_Iio_self
theorem bounded_le_Ico [Preorder α] (a b : α) : Bounded (· ≤ ·) (Ico a b) :=
(bounded_le_Iio b).mono Set.Ico_subset_Iio_self
theorem bounded_le_Ioc [Preorder α] (a b : α) : Bounded (· ≤ ·) (Ioc a b) :=
(bounded_le_Iic b).mono Set.Ioc_subset_Iic_self
theorem bounded_le_Icc [Preorder α] (a b : α) : Bounded (· ≤ ·) (Icc a b) :=
(bounded_le_Iic b).mono Set.Icc_subset_Iic_self
theorem bounded_gt_Ioo [Preorder α] (a b : α) : Bounded (· > ·) (Ioo a b) :=
(bounded_gt_Ioi a).mono Set.Ioo_subset_Ioi_self
theorem bounded_gt_Ioc [Preorder α] (a b : α) : Bounded (· > ·) (Ioc a b) :=
(bounded_gt_Ioi a).mono Set.Ioc_subset_Ioi_self
theorem bounded_gt_Ico [Preorder α] [NoMinOrder α] (a b : α) : Bounded (· > ·) (Ico a b) :=
(bounded_gt_Ici a).mono Set.Ico_subset_Ici_self
theorem bounded_gt_Icc [Preorder α] [NoMinOrder α] (a b : α) : Bounded (· > ·) (Icc a b) :=
(bounded_gt_Ici a).mono Set.Icc_subset_Ici_self
theorem bounded_ge_Ioo [Preorder α] (a b : α) : Bounded (· ≥ ·) (Ioo a b) :=
(bounded_ge_Ioi a).mono Set.Ioo_subset_Ioi_self
theorem bounded_ge_Ioc [Preorder α] (a b : α) : Bounded (· ≥ ·) (Ioc a b) :=
(bounded_ge_Ioi a).mono Set.Ioc_subset_Ioi_self
theorem bounded_ge_Ico [Preorder α] (a b : α) : Bounded (· ≥ ·) (Ico a b) :=
(bounded_ge_Ici a).mono Set.Ico_subset_Ici_self
theorem bounded_ge_Icc [Preorder α] (a b : α) : Bounded (· ≥ ·) (Icc a b) :=
(bounded_ge_Ici a).mono Set.Icc_subset_Ici_self
/-! #### Unbounded intervals -/
theorem unbounded_le_Ioi [SemilatticeSup α] [NoMaxOrder α] (a : α) :
Unbounded (· ≤ ·) (Ioi a) := fun b =>
let ⟨c, hc⟩ := exists_gt (a ⊔ b)
⟨c, le_sup_left.trans_lt hc, (le_sup_right.trans_lt hc).not_le⟩
theorem unbounded_le_Ici [SemilatticeSup α] [NoMaxOrder α] (a : α) :
Unbounded (· ≤ ·) (Ici a) :=
(unbounded_le_Ioi a).mono Set.Ioi_subset_Ici_self
theorem unbounded_lt_Ioi [SemilatticeSup α] [NoMaxOrder α] (a : α) :
Unbounded (· < ·) (Ioi a) :=
unbounded_lt_of_unbounded_le (unbounded_le_Ioi a)
theorem unbounded_lt_Ici [SemilatticeSup α] (a : α) : Unbounded (· < ·) (Ici a) := fun b =>
⟨a ⊔ b, le_sup_left, le_sup_right.not_lt⟩
/-! ### Bounded initial segments -/
theorem bounded_inter_not (H : ∀ a b, ∃ m, ∀ c, r c a ∨ r c b → r c m) (a : α) :
Bounded r (s ∩ { b | ¬r b a }) ↔ Bounded r s := by
refine ⟨?_, Bounded.mono inter_subset_left⟩
rintro ⟨b, hb⟩
obtain ⟨m, hm⟩ := H a b
exact ⟨m, fun c hc => hm c (or_iff_not_imp_left.2 fun hca => hb c ⟨hc, hca⟩)⟩
theorem unbounded_inter_not (H : ∀ a b, ∃ m, ∀ c, r c a ∨ r c b → r c m) (a : α) :
Unbounded r (s ∩ { b | ¬r b a }) ↔ Unbounded r s := by
simp_rw [← not_bounded_iff, bounded_inter_not H]
/-! #### Less or equal -/
theorem bounded_le_inter_not_le [SemilatticeSup α] (a : α) :
Bounded (· ≤ ·) (s ∩ { b | ¬b ≤ a }) ↔ Bounded (· ≤ ·) s :=
bounded_inter_not (fun x y => ⟨x ⊔ y, fun _ h => h.elim le_sup_of_le_left le_sup_of_le_right⟩) a
theorem unbounded_le_inter_not_le [SemilatticeSup α] (a : α) :
Unbounded (· ≤ ·) (s ∩ { b | ¬b ≤ a }) ↔ Unbounded (· ≤ ·) s := by
rw [← not_bounded_iff, ← not_bounded_iff, not_iff_not]
exact bounded_le_inter_not_le a
theorem bounded_le_inter_lt [LinearOrder α] (a : α) :
Bounded (· ≤ ·) (s ∩ { b | a < b }) ↔ Bounded (· ≤ ·) s := by
simp_rw [← not_le, bounded_le_inter_not_le]
theorem unbounded_le_inter_lt [LinearOrder α] (a : α) :
Unbounded (· ≤ ·) (s ∩ { b | a < b }) ↔ Unbounded (· ≤ ·) s := by
convert @unbounded_le_inter_not_le _ s _ a
exact lt_iff_not_le
theorem bounded_le_inter_le [LinearOrder α] (a : α) :
Bounded (· ≤ ·) (s ∩ { b | a ≤ b }) ↔ Bounded (· ≤ ·) s := by
refine ⟨?_, Bounded.mono Set.inter_subset_left⟩
rw [← @bounded_le_inter_lt _ s _ a]
exact Bounded.mono fun x ⟨hx, hx'⟩ => ⟨hx, le_of_lt hx'⟩
theorem unbounded_le_inter_le [LinearOrder α] (a : α) :
Unbounded (· ≤ ·) (s ∩ { b | a ≤ b }) ↔ Unbounded (· ≤ ·) s := by
rw [← not_bounded_iff, ← not_bounded_iff, not_iff_not]
exact bounded_le_inter_le a
/-! #### Less than -/
theorem bounded_lt_inter_not_lt [SemilatticeSup α] (a : α) :
Bounded (· < ·) (s ∩ { b | ¬b < a }) ↔ Bounded (· < ·) s :=
bounded_inter_not (fun x y => ⟨x ⊔ y, fun _ h => h.elim lt_sup_of_lt_left lt_sup_of_lt_right⟩) a
theorem unbounded_lt_inter_not_lt [SemilatticeSup α] (a : α) :
Unbounded (· < ·) (s ∩ { b | ¬b < a }) ↔ Unbounded (· < ·) s := by
rw [← not_bounded_iff, ← not_bounded_iff, not_iff_not]
exact bounded_lt_inter_not_lt a
theorem bounded_lt_inter_le [LinearOrder α] (a : α) :
Bounded (· < ·) (s ∩ { b | a ≤ b }) ↔ Bounded (· < ·) s := by
convert @bounded_lt_inter_not_lt _ s _ a
exact not_lt.symm
theorem unbounded_lt_inter_le [LinearOrder α] (a : α) :
Unbounded (· < ·) (s ∩ { b | a ≤ b }) ↔ Unbounded (· < ·) s := by
convert @unbounded_lt_inter_not_lt _ s _ a
exact not_lt.symm
theorem bounded_lt_inter_lt [LinearOrder α] [NoMaxOrder α] (a : α) :
Bounded (· < ·) (s ∩ { b | a < b }) ↔ Bounded (· < ·) s := by
rw [← bounded_le_iff_bounded_lt, ← bounded_le_iff_bounded_lt]
exact bounded_le_inter_lt a
theorem unbounded_lt_inter_lt [LinearOrder α] [NoMaxOrder α] (a : α) :
Unbounded (· < ·) (s ∩ { b | a < b }) ↔ Unbounded (· < ·) s := by
rw [← not_bounded_iff, ← not_bounded_iff, not_iff_not]
exact bounded_lt_inter_lt a
/-! #### Greater or equal -/
theorem bounded_ge_inter_not_ge [SemilatticeInf α] (a : α) :
Bounded (· ≥ ·) (s ∩ { b | ¬a ≤ b }) ↔ Bounded (· ≥ ·) s :=
@bounded_le_inter_not_le αᵒᵈ s _ a
theorem unbounded_ge_inter_not_ge [SemilatticeInf α] (a : α) :
Unbounded (· ≥ ·) (s ∩ { b | ¬a ≤ b }) ↔ Unbounded (· ≥ ·) s :=
@unbounded_le_inter_not_le αᵒᵈ s _ a
theorem bounded_ge_inter_gt [LinearOrder α] (a : α) :
Bounded (· ≥ ·) (s ∩ { b | b < a }) ↔ Bounded (· ≥ ·) s :=
@bounded_le_inter_lt αᵒᵈ s _ a
theorem unbounded_ge_inter_gt [LinearOrder α] (a : α) :
Unbounded (· ≥ ·) (s ∩ { b | b < a }) ↔ Unbounded (· ≥ ·) s :=
@unbounded_le_inter_lt αᵒᵈ s _ a
theorem bounded_ge_inter_ge [LinearOrder α] (a : α) :
Bounded (· ≥ ·) (s ∩ { b | b ≤ a }) ↔ Bounded (· ≥ ·) s :=
@bounded_le_inter_le αᵒᵈ s _ a
theorem unbounded_ge_iff_unbounded_inter_ge [LinearOrder α] (a : α) :
Unbounded (· ≥ ·) (s ∩ { b | b ≤ a }) ↔ Unbounded (· ≥ ·) s :=
@unbounded_le_inter_le αᵒᵈ s _ a
/-! #### Greater than -/
theorem bounded_gt_inter_not_gt [SemilatticeInf α] (a : α) :
Bounded (· > ·) (s ∩ { b | ¬a < b }) ↔ Bounded (· > ·) s :=
@bounded_lt_inter_not_lt αᵒᵈ s _ a
theorem unbounded_gt_inter_not_gt [SemilatticeInf α] (a : α) :
Unbounded (· > ·) (s ∩ { b | ¬a < b }) ↔ Unbounded (· > ·) s :=
@unbounded_lt_inter_not_lt αᵒᵈ s _ a
theorem bounded_gt_inter_ge [LinearOrder α] (a : α) :
Bounded (· > ·) (s ∩ { b | b ≤ a }) ↔ Bounded (· > ·) s :=
@bounded_lt_inter_le αᵒᵈ s _ a
theorem unbounded_inter_ge [LinearOrder α] (a : α) :
Unbounded (· > ·) (s ∩ { b | b ≤ a }) ↔ Unbounded (· > ·) s :=
@unbounded_lt_inter_le αᵒᵈ s _ a
theorem bounded_gt_inter_gt [LinearOrder α] [NoMinOrder α] (a : α) :
Bounded (· > ·) (s ∩ { b | b < a }) ↔ Bounded (· > ·) s :=
@bounded_lt_inter_lt αᵒᵈ s _ _ a
| theorem unbounded_gt_inter_gt [LinearOrder α] [NoMinOrder α] (a : α) :
Unbounded (· > ·) (s ∩ { b | b < a }) ↔ Unbounded (· > ·) s :=
@unbounded_lt_inter_lt αᵒᵈ s _ _ a
| Mathlib/Order/Bounded.lean | 372 | 375 |
/-
Copyright (c) 2022 Yury Kudryashov. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Yury Kudryashov
-/
import Mathlib.Topology.Order.OrderClosed
import Mathlib.Topology.Order.LocalExtr
/-!
# Maximum/minimum on the closure of a set
In this file we prove several versions of the following statement: if `f : X → Y` has a (local or
not) maximum (or minimum) on a set `s` at a point `a` and is continuous on the closure of `s`, then
`f` has an extremum of the same type on `Closure s` at `a`.
-/
open Filter Set
open Topology
variable {X Y : Type*} [TopologicalSpace X] [TopologicalSpace Y] [Preorder Y]
[OrderClosedTopology Y] {f : X → Y} {s : Set X} {a : X}
protected theorem IsMaxOn.closure (h : IsMaxOn f s a) (hc : ContinuousOn f (closure s)) :
IsMaxOn f (closure s) a := fun x hx =>
ContinuousWithinAt.closure_le hx ((hc x hx).mono subset_closure) continuousWithinAt_const h
protected theorem IsMinOn.closure (h : IsMinOn f s a) (hc : ContinuousOn f (closure s)) :
IsMinOn f (closure s) a :=
h.dual.closure hc
protected theorem IsExtrOn.closure (h : IsExtrOn f s a) (hc : ContinuousOn f (closure s)) :
IsExtrOn f (closure s) a :=
h.elim (fun h => Or.inl <| h.closure hc) fun h => Or.inr <| h.closure hc
protected theorem IsLocalMaxOn.closure (h : IsLocalMaxOn f s a) (hc : ContinuousOn f (closure s)) :
IsLocalMaxOn f (closure s) a := by
rcases mem_nhdsWithin.1 h with ⟨U, Uo, aU, hU⟩
refine mem_nhdsWithin.2 ⟨U, Uo, aU, ?_⟩
rintro x ⟨hxU, hxs⟩
| refine ContinuousWithinAt.closure_le ?_ ?_ continuousWithinAt_const hU
· rwa [mem_closure_iff_nhdsWithin_neBot, nhdsWithin_inter_of_mem, ←
mem_closure_iff_nhdsWithin_neBot]
exact nhdsWithin_le_nhds (Uo.mem_nhds hxU)
· exact (hc _ hxs).mono (inter_subset_right.trans subset_closure)
protected theorem IsLocalMinOn.closure (h : IsLocalMinOn f s a) (hc : ContinuousOn f (closure s)) :
IsLocalMinOn f (closure s) a :=
IsLocalMaxOn.closure h.dual hc
| Mathlib/Topology/Order/ExtrClosure.lean | 42 | 51 |
/-
Copyright (c) 2020 Kyle Miller. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Kyle Miller
-/
import Mathlib.Algebra.BigOperators.Ring.Finset
import Mathlib.Combinatorics.SimpleGraph.Dart
import Mathlib.Combinatorics.SimpleGraph.Finite
import Mathlib.Data.ZMod.Basic
/-!
# Degree-sum formula and handshaking lemma
The degree-sum formula is that the sum of the degrees of the vertices in
a finite graph is equal to twice the number of edges. The handshaking lemma,
a corollary, is that the number of odd-degree vertices is even.
## Main definitions
- `SimpleGraph.sum_degrees_eq_twice_card_edges` is the degree-sum formula.
- `SimpleGraph.even_card_odd_degree_vertices` is the handshaking lemma.
- `SimpleGraph.odd_card_odd_degree_vertices_ne` is that the number of odd-degree
vertices different from a given odd-degree vertex is odd.
- `SimpleGraph.exists_ne_odd_degree_of_exists_odd_degree` is that the existence of an
odd-degree vertex implies the existence of another one.
## Implementation notes
We give a combinatorial proof by using the facts that (1) the map from
darts to vertices is such that each fiber has cardinality the degree
of the corresponding vertex and that (2) the map from darts to edges is 2-to-1.
## Tags
simple graphs, sums, degree-sum formula, handshaking lemma
-/
assert_not_exists Field TwoSidedIdeal
open Finset
namespace SimpleGraph
universe u
variable {V : Type u} (G : SimpleGraph V)
section DegreeSum
variable [Fintype V] [DecidableRel G.Adj]
theorem dart_fst_fiber [DecidableEq V] (v : V) :
({d : G.Dart | d.fst = v} : Finset _) = univ.image (G.dartOfNeighborSet v) := by
ext d
simp only [mem_image, true_and, mem_filter, SetCoe.exists, mem_univ, exists_prop_of_true]
constructor
· rintro rfl
exact ⟨_, d.adj, by ext <;> rfl⟩
· rintro ⟨e, he, rfl⟩
rfl
theorem dart_fst_fiber_card_eq_degree [DecidableEq V] (v : V) :
#{d : G.Dart | d.fst = v} = G.degree v := by
simpa only [dart_fst_fiber, Finset.card_univ, card_neighborSet_eq_degree] using
card_image_of_injective univ (G.dartOfNeighborSet_injective v)
theorem dart_card_eq_sum_degrees : Fintype.card G.Dart = ∑ v, G.degree v := by
haveI := Classical.decEq V
simp only [← card_univ, ← dart_fst_fiber_card_eq_degree]
exact card_eq_sum_card_fiberwise (by simp)
variable {G} in
theorem Dart.edge_fiber [DecidableEq V] (d : G.Dart) :
({d' : G.Dart | d'.edge = d.edge} : Finset _) = {d, d.symm} :=
Finset.ext fun d' => by simpa using dart_edge_eq_iff d' d
theorem dart_edge_fiber_card [DecidableEq V] (e : Sym2 V) (h : e ∈ G.edgeSet) :
#{d : G.Dart | d.edge = e} = 2 := by
obtain ⟨v, w⟩ := e
let d : G.Dart := ⟨(v, w), h⟩
convert congr_arg card d.edge_fiber
rw [card_insert_of_not_mem, card_singleton]
rw [mem_singleton]
exact d.symm_ne.symm
theorem dart_card_eq_twice_card_edges : Fintype.card G.Dart = 2 * #G.edgeFinset := by
classical
| rw [← card_univ]
rw [@card_eq_sum_card_fiberwise _ _ _ Dart.edge _ G.edgeFinset fun d _h =>
by rw [mem_coe, mem_edgeFinset]; apply Dart.edge_mem]
rw [← mul_comm, sum_const_nat]
intro e h
apply G.dart_edge_fiber_card e
rwa [← mem_edgeFinset]
| Mathlib/Combinatorics/SimpleGraph/DegreeSum.lean | 88 | 95 |
/-
Copyright (c) 2020 Kim Morrison. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Bhavik Mehta, Kim Morrison
-/
import Mathlib.CategoryTheory.Functor.Currying
import Mathlib.CategoryTheory.Subobject.FactorThru
import Mathlib.CategoryTheory.Subobject.WellPowered
import Mathlib.Data.Finset.Lattice.Fold
/-!
# The lattice of subobjects
We provide the `SemilatticeInf` with `OrderTop (Subobject X)` instance when `[HasPullback C]`,
and the `SemilatticeSup (Subobject X)` instance when `[HasImages C] [HasBinaryCoproducts C]`.
-/
universe w v₁ v₂ u₁ u₂
noncomputable section
open CategoryTheory CategoryTheory.Category CategoryTheory.Limits
variable {C : Type u₁} [Category.{v₁} C] {X Y Z : C}
variable {D : Type u₂} [Category.{v₂} D]
namespace CategoryTheory
namespace MonoOver
section Top
instance {X : C} : Top (MonoOver X) where top := mk' (𝟙 _)
instance {X : C} : Inhabited (MonoOver X) :=
⟨⊤⟩
/-- The morphism to the top object in `MonoOver X`. -/
def leTop (f : MonoOver X) : f ⟶ ⊤ :=
homMk f.arrow (comp_id _)
@[simp]
theorem top_left (X : C) : ((⊤ : MonoOver X) : C) = X :=
rfl
@[simp]
theorem top_arrow (X : C) : (⊤ : MonoOver X).arrow = 𝟙 X :=
rfl
/-- `map f` sends `⊤ : MonoOver X` to `⟨X, f⟩ : MonoOver Y`. -/
def mapTop (f : X ⟶ Y) [Mono f] : (map f).obj ⊤ ≅ mk' f :=
iso_of_both_ways (homMk (𝟙 _) rfl) (homMk (𝟙 _) (by simp [id_comp f]))
section
variable [HasPullbacks C]
/-- The pullback of the top object in `MonoOver Y`
is (isomorphic to) the top object in `MonoOver X`. -/
def pullbackTop (f : X ⟶ Y) : (pullback f).obj ⊤ ≅ ⊤ :=
iso_of_both_ways (leTop _)
(homMk (pullback.lift f (𝟙 _) (by simp)) (pullback.lift_snd _ _ _))
/-- There is a morphism from `⊤ : MonoOver A` to the pullback of a monomorphism along itself;
as the category is thin this is an isomorphism. -/
def topLEPullbackSelf {A B : C} (f : A ⟶ B) [Mono f] :
(⊤ : MonoOver A) ⟶ (pullback f).obj (mk' f) :=
homMk _ (pullback.lift_snd _ _ rfl)
/-- The pullback of a monomorphism along itself is isomorphic to the top object. -/
def pullbackSelf {A B : C} (f : A ⟶ B) [Mono f] : (pullback f).obj (mk' f) ≅ ⊤ :=
iso_of_both_ways (leTop _) (topLEPullbackSelf _)
end
end Top
section Bot
variable [HasInitial C] [InitialMonoClass C]
instance {X : C} : Bot (MonoOver X) where bot := mk' (initial.to X)
@[simp]
theorem bot_left (X : C) : ((⊥ : MonoOver X) : C) = ⊥_ C :=
rfl
@[simp]
theorem bot_arrow {X : C} : (⊥ : MonoOver X).arrow = initial.to X :=
rfl
/-- The (unique) morphism from `⊥ : MonoOver X` to any other `f : MonoOver X`. -/
def botLE {X : C} (f : MonoOver X) : ⊥ ⟶ f :=
homMk (initial.to _)
/-- `map f` sends `⊥ : MonoOver X` to `⊥ : MonoOver Y`. -/
def mapBot (f : X ⟶ Y) [Mono f] : (map f).obj ⊥ ≅ ⊥ :=
iso_of_both_ways (homMk (initial.to _)) (homMk (𝟙 _))
end Bot
section ZeroOrderBot
variable [HasZeroObject C]
open ZeroObject
/-- The object underlying `⊥ : Subobject B` is (up to isomorphism) the zero object. -/
def botCoeIsoZero {B : C} : ((⊥ : MonoOver B) : C) ≅ 0 :=
initialIsInitial.uniqueUpToIso HasZeroObject.zeroIsInitial
-- Porting note: removed @[simp] as the LHS simplifies
theorem bot_arrow_eq_zero [HasZeroMorphisms C] {B : C} : (⊥ : MonoOver B).arrow = 0 :=
zero_of_source_iso_zero _ botCoeIsoZero
end ZeroOrderBot
section Inf
variable [HasPullbacks C]
/-- When `[HasPullbacks C]`, `MonoOver A` has "intersections", functorial in both arguments.
As `MonoOver A` is only a preorder, this doesn't satisfy the axioms of `SemilatticeInf`,
but we reuse all the names from `SemilatticeInf` because they will be used to construct
`SemilatticeInf (subobject A)` shortly.
-/
@[simps]
def inf {A : C} : MonoOver A ⥤ MonoOver A ⥤ MonoOver A where
obj f := pullback f.arrow ⋙ map f.arrow
map k :=
{ app := fun g => by
apply homMk _ _
· apply pullback.lift (pullback.fst _ _) (pullback.snd _ _ ≫ k.left) _
rw [pullback.condition, assoc, w k]
dsimp
rw [pullback.lift_snd_assoc, assoc, w k] }
/-- A morphism from the "infimum" of two objects in `MonoOver A` to the first object. -/
def infLELeft {A : C} (f g : MonoOver A) : (inf.obj f).obj g ⟶ f :=
homMk _ rfl
/-- A morphism from the "infimum" of two objects in `MonoOver A` to the second object. -/
def infLERight {A : C} (f g : MonoOver A) : (inf.obj f).obj g ⟶ g :=
homMk _ pullback.condition
/-- A morphism version of the `le_inf` axiom. -/
def leInf {A : C} (f g h : MonoOver A) : (h ⟶ f) → (h ⟶ g) → (h ⟶ (inf.obj f).obj g) := by
intro k₁ k₂
refine homMk (pullback.lift k₂.left k₁.left ?_) ?_
· rw [w k₁, w k₂]
· erw [pullback.lift_snd_assoc, w k₁]
end Inf
section Sup
variable [HasImages C] [HasBinaryCoproducts C]
/-- When `[HasImages C] [HasBinaryCoproducts C]`, `MonoOver A` has a `sup` construction,
which is functorial in both arguments,
and which on `Subobject A` will induce a `SemilatticeSup`. -/
def sup {A : C} : MonoOver A ⥤ MonoOver A ⥤ MonoOver A :=
curryObj ((forget A).prod (forget A) ⋙ uncurry.obj Over.coprod ⋙ image)
/-- A morphism version of `le_sup_left`. -/
def leSupLeft {A : C} (f g : MonoOver A) : f ⟶ (sup.obj f).obj g := by
refine homMk (coprod.inl ≫ factorThruImage _) ?_
erw [Category.assoc, image.fac, coprod.inl_desc]
rfl
/-- A morphism version of `le_sup_right`. -/
def leSupRight {A : C} (f g : MonoOver A) : g ⟶ (sup.obj f).obj g := by
refine homMk (coprod.inr ≫ factorThruImage _) ?_
erw [Category.assoc, image.fac, coprod.inr_desc]
rfl
/-- A morphism version of `sup_le`. -/
def supLe {A : C} (f g h : MonoOver A) : (f ⟶ h) → (g ⟶ h) → ((sup.obj f).obj g ⟶ h) := by
intro k₁ k₂
refine homMk ?_ ?_
· apply image.lift ⟨_, h.arrow, coprod.desc k₁.left k₂.left, _⟩
ext
· simp [w k₁]
· simp [w k₂]
· apply image.lift_fac
end Sup
end MonoOver
namespace Subobject
section OrderTop
instance orderTop {X : C} : OrderTop (Subobject X) where
top := Quotient.mk'' ⊤
le_top := by
refine Quotient.ind' fun f => ?_
exact ⟨MonoOver.leTop f⟩
instance {X : C} : Inhabited (Subobject X) :=
⟨⊤⟩
theorem top_eq_id (B : C) : (⊤ : Subobject B) = Subobject.mk (𝟙 B) :=
rfl
theorem underlyingIso_top_hom {B : C} : (underlyingIso (𝟙 B)).hom = (⊤ : Subobject B).arrow := by
convert underlyingIso_hom_comp_eq_mk (𝟙 B)
simp only [comp_id]
instance top_arrow_isIso {B : C} : IsIso (⊤ : Subobject B).arrow := by
rw [← underlyingIso_top_hom]
infer_instance
@[reassoc (attr := simp)]
theorem underlyingIso_inv_top_arrow {B : C} :
(underlyingIso _).inv ≫ (⊤ : Subobject B).arrow = 𝟙 B :=
underlyingIso_arrow _
@[simp]
theorem map_top (f : X ⟶ Y) [Mono f] : (map f).obj ⊤ = Subobject.mk f :=
Quotient.sound' ⟨MonoOver.mapTop f⟩
theorem top_factors {A B : C} (f : A ⟶ B) : (⊤ : Subobject B).Factors f :=
⟨f, comp_id _⟩
theorem isIso_iff_mk_eq_top {X Y : C} (f : X ⟶ Y) [Mono f] : IsIso f ↔ mk f = ⊤ :=
⟨fun _ => mk_eq_mk_of_comm _ _ (asIso f) (Category.comp_id _), fun h => by
rw [← ofMkLEMk_comp h.le, Category.comp_id]
exact (isoOfMkEqMk _ _ h).isIso_hom⟩
theorem isIso_arrow_iff_eq_top {Y : C} (P : Subobject Y) : IsIso P.arrow ↔ P = ⊤ := by
rw [isIso_iff_mk_eq_top, mk_arrow]
instance isIso_top_arrow {Y : C} : IsIso (⊤ : Subobject Y).arrow := by rw [isIso_arrow_iff_eq_top]
theorem mk_eq_top_of_isIso {X Y : C} (f : X ⟶ Y) [IsIso f] : mk f = ⊤ :=
(isIso_iff_mk_eq_top f).mp inferInstance
theorem eq_top_of_isIso_arrow {Y : C} (P : Subobject Y) [IsIso P.arrow] : P = ⊤ :=
(isIso_arrow_iff_eq_top P).mp inferInstance
lemma epi_iff_mk_eq_top [Balanced C] (f : X ⟶ Y) [Mono f] :
Epi f ↔ Subobject.mk f = ⊤ := by
rw [← isIso_iff_mk_eq_top]
exact ⟨fun _ ↦ isIso_of_mono_of_epi f, fun _ ↦ inferInstance⟩
section
variable [HasPullbacks C]
theorem pullback_top (f : X ⟶ Y) : (pullback f).obj ⊤ = ⊤ :=
Quotient.sound' ⟨MonoOver.pullbackTop f⟩
theorem pullback_self {A B : C} (f : A ⟶ B) [Mono f] : (pullback f).obj (mk f) = ⊤ :=
Quotient.sound' ⟨MonoOver.pullbackSelf f⟩
end
end OrderTop
section OrderBot
variable [HasInitial C] [InitialMonoClass C]
instance orderBot {X : C} : OrderBot (Subobject X) where
bot := Quotient.mk'' ⊥
bot_le := by
refine Quotient.ind' fun f => ?_
exact ⟨MonoOver.botLE f⟩
theorem bot_eq_initial_to {B : C} : (⊥ : Subobject B) = Subobject.mk (initial.to B) :=
rfl
/-- The object underlying `⊥ : Subobject B` is (up to isomorphism) the initial object. -/
def botCoeIsoInitial {B : C} : ((⊥ : Subobject B) : C) ≅ ⊥_ C :=
underlyingIso _
theorem map_bot (f : X ⟶ Y) [Mono f] : (map f).obj ⊥ = ⊥ :=
Quotient.sound' ⟨MonoOver.mapBot f⟩
end OrderBot
section ZeroOrderBot
variable [HasZeroObject C]
open ZeroObject
/-- The object underlying `⊥ : Subobject B` is (up to isomorphism) the zero object. -/
def botCoeIsoZero {B : C} : ((⊥ : Subobject B) : C) ≅ 0 :=
botCoeIsoInitial ≪≫ initialIsInitial.uniqueUpToIso HasZeroObject.zeroIsInitial
variable [HasZeroMorphisms C]
theorem bot_eq_zero {B : C} : (⊥ : Subobject B) = Subobject.mk (0 : 0 ⟶ B) :=
mk_eq_mk_of_comm _ _ (initialIsInitial.uniqueUpToIso HasZeroObject.zeroIsInitial)
(by simp [eq_iff_true_of_subsingleton])
@[simp]
theorem bot_arrow {B : C} : (⊥ : Subobject B).arrow = 0 :=
zero_of_source_iso_zero _ botCoeIsoZero
theorem bot_factors_iff_zero {A B : C} (f : A ⟶ B) : (⊥ : Subobject B).Factors f ↔ f = 0 :=
⟨by
rintro ⟨h, rfl⟩
simp only [MonoOver.bot_arrow_eq_zero, Functor.id_obj, Functor.const_obj_obj,
MonoOver.bot_left, comp_zero],
by
rintro rfl
exact ⟨0, by simp⟩⟩
theorem mk_eq_bot_iff_zero {f : X ⟶ Y} [Mono f] : Subobject.mk f = ⊥ ↔ f = 0 :=
⟨fun h => by simpa [h, bot_factors_iff_zero] using mk_factors_self f, fun h =>
mk_eq_mk_of_comm _ _ ((isoZeroOfMonoEqZero h).trans HasZeroObject.zeroIsoInitial) (by simp [h])⟩
end ZeroOrderBot
section Functor
variable (C)
/-- Sending `X : C` to `Subobject X` is a contravariant functor `Cᵒᵖ ⥤ Type`. -/
@[simps]
def functor [HasPullbacks C] : Cᵒᵖ ⥤ Type max u₁ v₁ where
obj X := Subobject X.unop
map f := (pullback f.unop).obj
map_id _ := funext pullback_id
map_comp _ _ := funext (pullback_comp _ _)
end Functor
section SemilatticeInfTop
variable [HasPullbacks C]
/-- The functorial infimum on `MonoOver A` descends to an infimum on `Subobject A`. -/
def inf {A : C} : Subobject A ⥤ Subobject A ⥤ Subobject A :=
ThinSkeleton.map₂ MonoOver.inf
theorem inf_le_left {A : C} (f g : Subobject A) : (inf.obj f).obj g ≤ f :=
Quotient.inductionOn₂' f g fun _ _ => ⟨MonoOver.infLELeft _ _⟩
theorem inf_le_right {A : C} (f g : Subobject A) : (inf.obj f).obj g ≤ g :=
Quotient.inductionOn₂' f g fun _ _ => ⟨MonoOver.infLERight _ _⟩
theorem le_inf {A : C} (h f g : Subobject A) : h ≤ f → h ≤ g → h ≤ (inf.obj f).obj g :=
Quotient.inductionOn₃' h f g
(by
rintro f g h ⟨k⟩ ⟨l⟩
exact ⟨MonoOver.leInf _ _ _ k l⟩)
instance semilatticeInf {B : C} : SemilatticeInf (Subobject B) where
inf := fun m n => (inf.obj m).obj n
inf_le_left := inf_le_left
inf_le_right := inf_le_right
le_inf := le_inf
theorem factors_left_of_inf_factors {A B : C} {X Y : Subobject B} {f : A ⟶ B}
(h : (X ⊓ Y).Factors f) : X.Factors f :=
factors_of_le _ (inf_le_left _ _) h
theorem factors_right_of_inf_factors {A B : C} {X Y : Subobject B} {f : A ⟶ B}
(h : (X ⊓ Y).Factors f) : Y.Factors f :=
factors_of_le _ (inf_le_right _ _) h
@[simp]
theorem inf_factors {A B : C} {X Y : Subobject B} (f : A ⟶ B) :
(X ⊓ Y).Factors f ↔ X.Factors f ∧ Y.Factors f :=
⟨fun h => ⟨factors_left_of_inf_factors h, factors_right_of_inf_factors h⟩, by
revert X Y
apply Quotient.ind₂'
rintro X Y ⟨⟨g₁, rfl⟩, ⟨g₂, hg₂⟩⟩
exact ⟨_, pullback.lift_snd_assoc _ _ hg₂ _⟩⟩
theorem inf_arrow_factors_left {B : C} (X Y : Subobject B) : X.Factors (X ⊓ Y).arrow :=
(factors_iff _ _).mpr ⟨ofLE (X ⊓ Y) X (inf_le_left X Y), by simp⟩
theorem inf_arrow_factors_right {B : C} (X Y : Subobject B) : Y.Factors (X ⊓ Y).arrow :=
(factors_iff _ _).mpr ⟨ofLE (X ⊓ Y) Y (inf_le_right X Y), by simp⟩
@[simp]
theorem finset_inf_factors {I : Type*} {A B : C} {s : Finset I} {P : I → Subobject B} (f : A ⟶ B) :
(s.inf P).Factors f ↔ ∀ i ∈ s, (P i).Factors f := by
classical
induction s using Finset.induction_on with
| empty => simp [top_factors]
| insert _ _ _ ih => simp [ih]
-- `i` is explicit here because often we'd like to defer a proof of `m`
theorem finset_inf_arrow_factors {I : Type*} {B : C} (s : Finset I) (P : I → Subobject B) (i : I)
(m : i ∈ s) : (P i).Factors (s.inf P).arrow := by
classical
revert i m
induction s using Finset.induction_on with
| empty => rintro _ ⟨⟩
| insert _ _ _ ih =>
intro _ m
rw [Finset.inf_insert]
simp only [Finset.mem_insert] at m
rcases m with (rfl | m)
· rw [← factorThru_arrow _ _ (inf_arrow_factors_left _ _)]
exact factors_comp_arrow _
· rw [← factorThru_arrow _ _ (inf_arrow_factors_right _ _)]
apply factors_of_factors_right
exact ih _ m
theorem inf_eq_map_pullback' {A : C} (f₁ : MonoOver A) (f₂ : Subobject A) :
(Subobject.inf.obj (Quotient.mk'' f₁)).obj f₂ =
(Subobject.map f₁.arrow).obj ((Subobject.pullback f₁.arrow).obj f₂) := by
induction' f₂ using Quotient.inductionOn' with f₂
rfl
theorem inf_eq_map_pullback {A : C} (f₁ : MonoOver A) (f₂ : Subobject A) :
| (Quotient.mk'' f₁ ⊓ f₂ : Subobject A) = (map f₁.arrow).obj ((pullback f₁.arrow).obj f₂) :=
inf_eq_map_pullback' f₁ f₂
theorem prod_eq_inf {A : C} {f₁ f₂ : Subobject A} [HasBinaryProduct f₁ f₂] :
(f₁ ⨯ f₂) = f₁ ⊓ f₂ := by
apply le_antisymm
· refine le_inf _ _ _ (Limits.prod.fst.le) (Limits.prod.snd.le)
| Mathlib/CategoryTheory/Subobject/Lattice.lean | 417 | 423 |
/-
Copyright (c) 2022 Violeta Hernández Palacios. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Violeta Hernández Palacios
-/
import Mathlib.Computability.Primrec
import Mathlib.Tactic.Ring
import Mathlib.Tactic.Linarith
/-!
# Ackermann function
In this file, we define the two-argument Ackermann function `ack`. Despite having a recursive
definition, we show that this isn't a primitive recursive function.
## Main results
- `exists_lt_ack_of_nat_primrec`: any primitive recursive function is pointwise bounded above by
`ack m` for some `m`.
- `not_primrec₂_ack`: the two-argument Ackermann function is not primitive recursive.
## Proof approach
We very broadly adapt the proof idea from
https://www.planetmath.org/ackermannfunctionisnotprimitiverecursive. Namely, we prove that for any
primitive recursive `f : ℕ → ℕ`, there exists `m` such that `f n < ack m n` for all `n`. This then
implies that `fun n => ack n n` can't be primitive recursive, and so neither can `ack`. We aren't
able to use the same bounds as in that proof though, since our approach of using pairing functions
differs from their approach of using multivariate functions.
The important bounds we show during the main inductive proof (`exists_lt_ack_of_nat_primrec`)
are the following. Assuming `∀ n, f n < ack a n` and `∀ n, g n < ack b n`, we have:
- `∀ n, pair (f n) (g n) < ack (max a b + 3) n`.
- `∀ n, g (f n) < ack (max a b + 2) n`.
- `∀ n, Nat.rec (f n.unpair.1) (fun (y IH : ℕ) => g (pair n.unpair.1 (pair y IH)))
n.unpair.2 < ack (max a b + 9) n`.
The last one is evidently the hardest. Using `unpair_add_le`, we reduce it to the more manageable
- `∀ m n, rec (f m) (fun (y IH : ℕ) => g (pair m (pair y IH))) n <
ack (max a b + 9) (m + n)`.
We then prove this by induction on `n`. Our proof crucially depends on `ack_pair_lt`, which is
applied twice, giving us a constant of `4 + 4`. The rest of the proof consists of simpler bounds
which bump up our constant to `9`.
-/
open Nat
/-- The two-argument Ackermann function, defined so that
- `ack 0 n = n + 1`
- `ack (m + 1) 0 = ack m 1`
- `ack (m + 1) (n + 1) = ack m (ack (m + 1) n)`.
This is of interest as both a fast-growing function, and as an example of a recursive function that
isn't primitive recursive. -/
def ack : ℕ → ℕ → ℕ
| 0, n => n + 1
| m + 1, 0 => ack m 1
| m + 1, n + 1 => ack m (ack (m + 1) n)
@[simp]
theorem ack_zero (n : ℕ) : ack 0 n = n + 1 := by rw [ack]
@[simp]
theorem ack_succ_zero (m : ℕ) : ack (m + 1) 0 = ack m 1 := by rw [ack]
@[simp]
theorem ack_succ_succ (m n : ℕ) : ack (m + 1) (n + 1) = ack m (ack (m + 1) n) := by rw [ack]
@[simp]
theorem ack_one (n : ℕ) : ack 1 n = n + 2 := by
induction' n with n IH
· simp
· simp [IH]
@[simp]
theorem ack_two (n : ℕ) : ack 2 n = 2 * n + 3 := by
induction' n with n IH
· simp
· simpa [mul_succ]
@[simp]
theorem ack_three (n : ℕ) : ack 3 n = 2 ^ (n + 3) - 3 := by
induction' n with n IH
| · simp
· rw [ack_succ_succ, IH, ack_two, Nat.succ_add, Nat.pow_succ 2 (n + 3), mul_comm _ 2,
Nat.mul_sub_left_distrib, ← Nat.sub_add_comm, two_mul 3, Nat.add_sub_add_right]
have H : 2 * 3 ≤ 2 * 2 ^ 3 := by norm_num
| Mathlib/Computability/Ackermann.lean | 89 | 92 |
/-
Copyright (c) 2015 Microsoft Corporation. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Leonardo de Moura, Jeremy Avigad, Minchao Wu, Mario Carneiro
-/
import Mathlib.Data.Finset.Attach
import Mathlib.Data.Finset.Disjoint
import Mathlib.Data.Finset.Erase
import Mathlib.Data.Finset.Filter
import Mathlib.Data.Finset.Range
import Mathlib.Data.Finset.SDiff
import Mathlib.Data.Multiset.Basic
import Mathlib.Logic.Equiv.Set
import Mathlib.Order.Directed
import Mathlib.Order.Interval.Set.Defs
import Mathlib.Data.Set.SymmDiff
/-!
# Basic lemmas on finite sets
This file contains lemmas on the interaction of various definitions on the `Finset` type.
For an explanation of `Finset` design decisions, please see `Mathlib/Data/Finset/Defs.lean`.
## Main declarations
### Main definitions
* `Finset.choose`: Given a proof `h` of existence and uniqueness of a certain element
satisfying a predicate, `choose s h` returns the element of `s` satisfying that predicate.
### Equivalences between finsets
* The `Mathlib/Logic/Equiv/Defs.lean` file describes a general type of equivalence, so look in there
for any lemmas. There is some API for rewriting sums and products from `s` to `t` given that
`s ≃ t`.
TODO: examples
## Tags
finite sets, finset
-/
-- Assert that we define `Finset` without the material on `List.sublists`.
-- Note that we cannot use `List.sublists` itself as that is defined very early.
assert_not_exists List.sublistsLen Multiset.powerset CompleteLattice Monoid
open Multiset Subtype Function
universe u
variable {α : Type*} {β : Type*} {γ : Type*}
namespace Finset
-- TODO: these should be global attributes, but this will require fixing other files
attribute [local trans] Subset.trans Superset.trans
set_option linter.deprecated false in
@[deprecated "Deprecated without replacement." (since := "2025-02-07")]
theorem sizeOf_lt_sizeOf_of_mem [SizeOf α] {x : α} {s : Finset α} (hx : x ∈ s) :
SizeOf.sizeOf x < SizeOf.sizeOf s := by
cases s
dsimp [SizeOf.sizeOf, SizeOf.sizeOf, Multiset.sizeOf]
rw [Nat.add_comm]
refine lt_trans ?_ (Nat.lt_succ_self _)
exact Multiset.sizeOf_lt_sizeOf_of_mem hx
/-! ### Lattice structure -/
section Lattice
variable [DecidableEq α] {s s₁ s₂ t t₁ t₂ u v : Finset α} {a b : α}
/-! #### union -/
@[simp]
theorem disjUnion_eq_union (s t h) : @disjUnion α s t h = s ∪ t :=
ext fun a => by simp
@[simp]
theorem disjoint_union_left : Disjoint (s ∪ t) u ↔ Disjoint s u ∧ Disjoint t u := by
simp only [disjoint_left, mem_union, or_imp, forall_and]
@[simp]
theorem disjoint_union_right : Disjoint s (t ∪ u) ↔ Disjoint s t ∧ Disjoint s u := by
simp only [disjoint_right, mem_union, or_imp, forall_and]
/-! #### inter -/
theorem not_disjoint_iff_nonempty_inter : ¬Disjoint s t ↔ (s ∩ t).Nonempty :=
not_disjoint_iff.trans <| by simp [Finset.Nonempty]
alias ⟨_, Nonempty.not_disjoint⟩ := not_disjoint_iff_nonempty_inter
theorem disjoint_or_nonempty_inter (s t : Finset α) : Disjoint s t ∨ (s ∩ t).Nonempty := by
rw [← not_disjoint_iff_nonempty_inter]
exact em _
omit [DecidableEq α] in
theorem disjoint_of_subset_iff_left_eq_empty (h : s ⊆ t) :
Disjoint s t ↔ s = ∅ :=
disjoint_of_le_iff_left_eq_bot h
lemma pairwiseDisjoint_iff {ι : Type*} {s : Set ι} {f : ι → Finset α} :
s.PairwiseDisjoint f ↔ ∀ ⦃i⦄, i ∈ s → ∀ ⦃j⦄, j ∈ s → (f i ∩ f j).Nonempty → i = j := by
simp [Set.PairwiseDisjoint, Set.Pairwise, Function.onFun, not_imp_comm (a := _ = _),
not_disjoint_iff_nonempty_inter]
end Lattice
instance isDirected_le : IsDirected (Finset α) (· ≤ ·) := by classical infer_instance
instance isDirected_subset : IsDirected (Finset α) (· ⊆ ·) := isDirected_le
/-! ### erase -/
section Erase
variable [DecidableEq α] {s t u v : Finset α} {a b : α}
@[simp]
theorem erase_empty (a : α) : erase ∅ a = ∅ :=
rfl
protected lemma Nontrivial.erase_nonempty (hs : s.Nontrivial) : (s.erase a).Nonempty :=
(hs.exists_ne a).imp <| by aesop
@[simp] lemma erase_nonempty (ha : a ∈ s) : (s.erase a).Nonempty ↔ s.Nontrivial := by
simp only [Finset.Nonempty, mem_erase, and_comm (b := _ ∈ _)]
refine ⟨?_, fun hs ↦ hs.exists_ne a⟩
rintro ⟨b, hb, hba⟩
exact ⟨_, hb, _, ha, hba⟩
@[simp]
theorem erase_singleton (a : α) : ({a} : Finset α).erase a = ∅ := by
ext x
simp
@[simp]
theorem erase_insert_eq_erase (s : Finset α) (a : α) : (insert a s).erase a = s.erase a :=
ext fun x => by
simp +contextual only [mem_erase, mem_insert, and_congr_right_iff,
false_or, iff_self, imp_true_iff]
theorem erase_insert {a : α} {s : Finset α} (h : a ∉ s) : erase (insert a s) a = s := by
rw [erase_insert_eq_erase, erase_eq_of_not_mem h]
theorem erase_insert_of_ne {a b : α} {s : Finset α} (h : a ≠ b) :
erase (insert a s) b = insert a (erase s b) :=
ext fun x => by
have : x ≠ b ∧ x = a ↔ x = a := and_iff_right_of_imp fun hx => hx.symm ▸ h
simp only [mem_erase, mem_insert, and_or_left, this]
theorem erase_cons_of_ne {a b : α} {s : Finset α} (ha : a ∉ s) (hb : a ≠ b) :
erase (cons a s ha) b = cons a (erase s b) fun h => ha <| erase_subset _ _ h := by
simp only [cons_eq_insert, erase_insert_of_ne hb]
@[simp] theorem insert_erase (h : a ∈ s) : insert a (erase s a) = s :=
ext fun x => by
simp only [mem_insert, mem_erase, or_and_left, dec_em, true_and]
apply or_iff_right_of_imp
rintro rfl
exact h
lemma erase_eq_iff_eq_insert (hs : a ∈ s) (ht : a ∉ t) : erase s a = t ↔ s = insert a t := by
aesop
lemma insert_erase_invOn :
Set.InvOn (insert a) (fun s ↦ erase s a) {s : Finset α | a ∈ s} {s : Finset α | a ∉ s} :=
⟨fun _s ↦ insert_erase, fun _s ↦ erase_insert⟩
theorem erase_ssubset {a : α} {s : Finset α} (h : a ∈ s) : s.erase a ⊂ s :=
calc
s.erase a ⊂ insert a (s.erase a) := ssubset_insert <| not_mem_erase _ _
_ = _ := insert_erase h
theorem ssubset_iff_exists_subset_erase {s t : Finset α} : s ⊂ t ↔ ∃ a ∈ t, s ⊆ t.erase a := by
refine ⟨fun h => ?_, fun ⟨a, ha, h⟩ => ssubset_of_subset_of_ssubset h <| erase_ssubset ha⟩
obtain ⟨a, ht, hs⟩ := not_subset.1 h.2
exact ⟨a, ht, subset_erase.2 ⟨h.1, hs⟩⟩
theorem erase_ssubset_insert (s : Finset α) (a : α) : s.erase a ⊂ insert a s :=
ssubset_iff_exists_subset_erase.2
⟨a, mem_insert_self _ _, erase_subset_erase _ <| subset_insert _ _⟩
theorem erase_cons {s : Finset α} {a : α} (h : a ∉ s) : (s.cons a h).erase a = s := by
rw [cons_eq_insert, erase_insert_eq_erase, erase_eq_of_not_mem h]
theorem subset_insert_iff {a : α} {s t : Finset α} : s ⊆ insert a t ↔ erase s a ⊆ t := by
simp only [subset_iff, or_iff_not_imp_left, mem_erase, mem_insert, and_imp]
exact forall_congr' fun x => forall_swap
theorem erase_insert_subset (a : α) (s : Finset α) : erase (insert a s) a ⊆ s :=
subset_insert_iff.1 <| Subset.rfl
theorem insert_erase_subset (a : α) (s : Finset α) : s ⊆ insert a (erase s a) :=
subset_insert_iff.2 <| Subset.rfl
theorem subset_insert_iff_of_not_mem (h : a ∉ s) : s ⊆ insert a t ↔ s ⊆ t := by
rw [subset_insert_iff, erase_eq_of_not_mem h]
theorem erase_subset_iff_of_mem (h : a ∈ t) : s.erase a ⊆ t ↔ s ⊆ t := by
rw [← subset_insert_iff, insert_eq_of_mem h]
theorem erase_injOn' (a : α) : { s : Finset α | a ∈ s }.InjOn fun s => erase s a :=
fun s hs t ht (h : s.erase a = _) => by rw [← insert_erase hs, ← insert_erase ht, h]
end Erase
lemma Nontrivial.exists_cons_eq {s : Finset α} (hs : s.Nontrivial) :
∃ t a ha b hb hab, (cons b t hb).cons a (mem_cons.not.2 <| not_or_intro hab ha) = s := by
classical
obtain ⟨a, ha, b, hb, hab⟩ := hs
have : b ∈ s.erase a := mem_erase.2 ⟨hab.symm, hb⟩
refine ⟨(s.erase a).erase b, a, ?_, b, ?_, ?_, ?_⟩ <;>
simp [insert_erase this, insert_erase ha, *]
/-! ### sdiff -/
section Sdiff
variable [DecidableEq α] {s t u v : Finset α} {a b : α}
lemma erase_sdiff_erase (hab : a ≠ b) (hb : b ∈ s) : s.erase a \ s.erase b = {b} := by
ext; aesop
-- TODO: Do we want to delete this lemma and `Finset.disjUnion_singleton`,
-- or instead add `Finset.union_singleton`/`Finset.singleton_union`?
theorem sdiff_singleton_eq_erase (a : α) (s : Finset α) : s \ {a} = erase s a := by
ext
rw [mem_erase, mem_sdiff, mem_singleton, and_comm]
-- This lemma matches `Finset.insert_eq` in functionality.
theorem erase_eq (s : Finset α) (a : α) : s.erase a = s \ {a} :=
(sdiff_singleton_eq_erase _ _).symm
theorem disjoint_erase_comm : Disjoint (s.erase a) t ↔ Disjoint s (t.erase a) := by
simp_rw [erase_eq, disjoint_sdiff_comm]
lemma disjoint_insert_erase (ha : a ∉ t) : Disjoint (s.erase a) (insert a t) ↔ Disjoint s t := by
rw [disjoint_erase_comm, erase_insert ha]
lemma disjoint_erase_insert (ha : a ∉ s) : Disjoint (insert a s) (t.erase a) ↔ Disjoint s t := by
rw [← disjoint_erase_comm, erase_insert ha]
theorem disjoint_of_erase_left (ha : a ∉ t) (hst : Disjoint (s.erase a) t) : Disjoint s t := by
rw [← erase_insert ha, ← disjoint_erase_comm, disjoint_insert_right]
exact ⟨not_mem_erase _ _, hst⟩
theorem disjoint_of_erase_right (ha : a ∉ s) (hst : Disjoint s (t.erase a)) : Disjoint s t := by
rw [← erase_insert ha, disjoint_erase_comm, disjoint_insert_left]
exact ⟨not_mem_erase _ _, hst⟩
theorem inter_erase (a : α) (s t : Finset α) : s ∩ t.erase a = (s ∩ t).erase a := by
simp only [erase_eq, inter_sdiff_assoc]
@[simp]
theorem erase_inter (a : α) (s t : Finset α) : s.erase a ∩ t = (s ∩ t).erase a := by
simpa only [inter_comm t] using inter_erase a t s
theorem erase_sdiff_comm (s t : Finset α) (a : α) : s.erase a \ t = (s \ t).erase a := by
simp_rw [erase_eq, sdiff_right_comm]
theorem erase_inter_comm (s t : Finset α) (a : α) : s.erase a ∩ t = s ∩ t.erase a := by
rw [erase_inter, inter_erase]
theorem erase_union_distrib (s t : Finset α) (a : α) : (s ∪ t).erase a = s.erase a ∪ t.erase a := by
simp_rw [erase_eq, union_sdiff_distrib]
theorem insert_inter_distrib (s t : Finset α) (a : α) :
insert a (s ∩ t) = insert a s ∩ insert a t := by simp_rw [insert_eq, union_inter_distrib_left]
theorem erase_sdiff_distrib (s t : Finset α) (a : α) : (s \ t).erase a = s.erase a \ t.erase a := by
simp_rw [erase_eq, sdiff_sdiff, sup_sdiff_eq_sup le_rfl, sup_comm]
theorem erase_union_of_mem (ha : a ∈ t) (s : Finset α) : s.erase a ∪ t = s ∪ t := by
rw [← insert_erase (mem_union_right s ha), erase_union_distrib, ← union_insert, insert_erase ha]
theorem union_erase_of_mem (ha : a ∈ s) (t : Finset α) : s ∪ t.erase a = s ∪ t := by
rw [← insert_erase (mem_union_left t ha), erase_union_distrib, ← insert_union, insert_erase ha]
theorem sdiff_union_erase_cancel (hts : t ⊆ s) (ha : a ∈ t) : s \ t ∪ t.erase a = s.erase a := by
simp_rw [erase_eq, sdiff_union_sdiff_cancel hts (singleton_subset_iff.2 ha)]
theorem sdiff_insert (s t : Finset α) (x : α) : s \ insert x t = (s \ t).erase x := by
simp_rw [← sdiff_singleton_eq_erase, insert_eq, sdiff_sdiff_left', sdiff_union_distrib,
inter_comm]
theorem sdiff_insert_insert_of_mem_of_not_mem {s t : Finset α} {x : α} (hxs : x ∈ s) (hxt : x ∉ t) :
insert x (s \ insert x t) = s \ t := by
rw [sdiff_insert, insert_erase (mem_sdiff.mpr ⟨hxs, hxt⟩)]
theorem sdiff_erase (h : a ∈ s) : s \ t.erase a = insert a (s \ t) := by
rw [← sdiff_singleton_eq_erase, sdiff_sdiff_eq_sdiff_union (singleton_subset_iff.2 h), insert_eq,
union_comm]
theorem sdiff_erase_self (ha : a ∈ s) : s \ s.erase a = {a} := by
rw [sdiff_erase ha, Finset.sdiff_self, insert_empty_eq]
theorem erase_eq_empty_iff (s : Finset α) (a : α) : s.erase a = ∅ ↔ s = ∅ ∨ s = {a} := by
rw [← sdiff_singleton_eq_erase, sdiff_eq_empty_iff_subset, subset_singleton_iff]
--TODO@Yaël: Kill lemmas duplicate with `BooleanAlgebra`
theorem sdiff_disjoint : Disjoint (t \ s) s :=
disjoint_left.2 fun _a ha => (mem_sdiff.1 ha).2
theorem disjoint_sdiff : Disjoint s (t \ s) :=
sdiff_disjoint.symm
theorem disjoint_sdiff_inter (s t : Finset α) : Disjoint (s \ t) (s ∩ t) :=
disjoint_of_subset_right inter_subset_right sdiff_disjoint
end Sdiff
/-! ### attach -/
@[simp]
theorem attach_empty : attach (∅ : Finset α) = ∅ :=
rfl
@[simp]
theorem attach_nonempty_iff {s : Finset α} : s.attach.Nonempty ↔ s.Nonempty := by
simp [Finset.Nonempty]
@[aesop safe apply (rule_sets := [finsetNonempty])]
protected alias ⟨_, Nonempty.attach⟩ := attach_nonempty_iff
@[simp]
theorem attach_eq_empty_iff {s : Finset α} : s.attach = ∅ ↔ s = ∅ := by
simp [eq_empty_iff_forall_not_mem]
/-! ### filter -/
section Filter
variable (p q : α → Prop) [DecidablePred p] [DecidablePred q] {s t : Finset α}
theorem filter_singleton (a : α) : filter p {a} = if p a then {a} else ∅ := by
classical
ext x
simp only [mem_singleton, forall_eq, mem_filter]
split_ifs with h <;> by_cases h' : x = a <;> simp [h, h']
theorem filter_cons_of_pos (a : α) (s : Finset α) (ha : a ∉ s) (hp : p a) :
filter p (cons a s ha) = cons a (filter p s) ((mem_of_mem_filter _).mt ha) :=
eq_of_veq <| Multiset.filter_cons_of_pos s.val hp
theorem filter_cons_of_neg (a : α) (s : Finset α) (ha : a ∉ s) (hp : ¬p a) :
filter p (cons a s ha) = filter p s :=
eq_of_veq <| Multiset.filter_cons_of_neg s.val hp
theorem disjoint_filter {s : Finset α} {p q : α → Prop} [DecidablePred p] [DecidablePred q] :
Disjoint (s.filter p) (s.filter q) ↔ ∀ x ∈ s, p x → ¬q x := by
constructor <;> simp +contextual [disjoint_left]
theorem disjoint_filter_filter' (s t : Finset α)
{p q : α → Prop} [DecidablePred p] [DecidablePred q] (h : Disjoint p q) :
Disjoint (s.filter p) (t.filter q) := by
simp_rw [disjoint_left, mem_filter]
rintro a ⟨_, hp⟩ ⟨_, hq⟩
rw [Pi.disjoint_iff] at h
simpa [hp, hq] using h a
theorem disjoint_filter_filter_neg (s t : Finset α) (p : α → Prop)
[DecidablePred p] [∀ x, Decidable (¬p x)] :
Disjoint (s.filter p) (t.filter fun a => ¬p a) :=
disjoint_filter_filter' s t disjoint_compl_right
theorem filter_disj_union (s : Finset α) (t : Finset α) (h : Disjoint s t) :
filter p (disjUnion s t h) = (filter p s).disjUnion (filter p t) (disjoint_filter_filter h) :=
eq_of_veq <| Multiset.filter_add _ _ _
theorem filter_cons {a : α} (s : Finset α) (ha : a ∉ s) :
filter p (cons a s ha) =
if p a then cons a (filter p s) ((mem_of_mem_filter _).mt ha) else filter p s := by
split_ifs with h
· rw [filter_cons_of_pos _ _ _ ha h]
· rw [filter_cons_of_neg _ _ _ ha h]
section
variable [DecidableEq α]
theorem filter_union (s₁ s₂ : Finset α) : (s₁ ∪ s₂).filter p = s₁.filter p ∪ s₂.filter p :=
ext fun _ => by simp only [mem_filter, mem_union, or_and_right]
theorem filter_union_right (s : Finset α) : s.filter p ∪ s.filter q = s.filter fun x => p x ∨ q x :=
ext fun x => by simp [mem_filter, mem_union, ← and_or_left]
theorem filter_mem_eq_inter {s t : Finset α} [∀ i, Decidable (i ∈ t)] :
(s.filter fun i => i ∈ t) = s ∩ t :=
ext fun i => by simp [mem_filter, mem_inter]
theorem filter_inter_distrib (s t : Finset α) : (s ∩ t).filter p = s.filter p ∩ t.filter p := by
ext
simp [mem_filter, mem_inter, and_assoc]
theorem filter_inter (s t : Finset α) : filter p s ∩ t = filter p (s ∩ t) := by
ext
simp only [mem_inter, mem_filter, and_right_comm]
theorem inter_filter (s t : Finset α) : s ∩ filter p t = filter p (s ∩ t) := by
rw [inter_comm, filter_inter, inter_comm]
theorem filter_insert (a : α) (s : Finset α) :
filter p (insert a s) = if p a then insert a (filter p s) else filter p s := by
ext x
split_ifs with h <;> by_cases h' : x = a <;> simp [h, h']
theorem filter_erase (a : α) (s : Finset α) : filter p (erase s a) = erase (filter p s) a := by
ext x
simp only [and_assoc, mem_filter, iff_self, mem_erase]
theorem filter_or (s : Finset α) : (s.filter fun a => p a ∨ q a) = s.filter p ∪ s.filter q :=
ext fun _ => by simp [mem_filter, mem_union, and_or_left]
theorem filter_and (s : Finset α) : (s.filter fun a => p a ∧ q a) = s.filter p ∩ s.filter q :=
ext fun _ => by simp [mem_filter, mem_inter, and_comm, and_left_comm, and_self_iff, and_assoc]
theorem filter_not (s : Finset α) : (s.filter fun a => ¬p a) = s \ s.filter p :=
ext fun a => by
simp only [Bool.decide_coe, Bool.not_eq_true', mem_filter, and_comm, mem_sdiff, not_and_or,
Bool.not_eq_true, and_or_left, and_not_self, or_false]
lemma filter_and_not (s : Finset α) (p q : α → Prop) [DecidablePred p] [DecidablePred q] :
s.filter (fun a ↦ p a ∧ ¬ q a) = s.filter p \ s.filter q := by
rw [filter_and, filter_not, ← inter_sdiff_assoc, inter_eq_left.2 (filter_subset _ _)]
theorem sdiff_eq_filter (s₁ s₂ : Finset α) : s₁ \ s₂ = filter (· ∉ s₂) s₁ :=
ext fun _ => by simp [mem_sdiff, mem_filter]
theorem subset_union_elim {s : Finset α} {t₁ t₂ : Set α} (h : ↑s ⊆ t₁ ∪ t₂) :
∃ s₁ s₂ : Finset α, s₁ ∪ s₂ = s ∧ ↑s₁ ⊆ t₁ ∧ ↑s₂ ⊆ t₂ \ t₁ := by
classical
refine ⟨s.filter (· ∈ t₁), s.filter (· ∉ t₁), ?_, ?_, ?_⟩
· simp [filter_union_right, em]
· intro x
simp
· intro x
simp only [not_not, coe_filter, Set.mem_setOf_eq, Set.mem_diff, and_imp]
intro hx hx₂
exact ⟨Or.resolve_left (h hx) hx₂, hx₂⟩
-- This is not a good simp lemma, as it would prevent `Finset.mem_filter` from firing
-- on, e.g. `x ∈ s.filter (Eq b)`.
/-- After filtering out everything that does not equal a given value, at most that value remains.
This is equivalent to `filter_eq'` with the equality the other way.
-/
theorem filter_eq [DecidableEq β] (s : Finset β) (b : β) :
s.filter (Eq b) = ite (b ∈ s) {b} ∅ := by
split_ifs with h
· ext
simp only [mem_filter, mem_singleton, decide_eq_true_eq]
refine ⟨fun h => h.2.symm, ?_⟩
rintro rfl
exact ⟨h, rfl⟩
· ext
simp only [mem_filter, not_and, iff_false, not_mem_empty, decide_eq_true_eq]
rintro m rfl
exact h m
/-- After filtering out everything that does not equal a given value, at most that value remains.
This is equivalent to `filter_eq` with the equality the other way.
-/
theorem filter_eq' [DecidableEq β] (s : Finset β) (b : β) :
(s.filter fun a => a = b) = ite (b ∈ s) {b} ∅ :=
_root_.trans (filter_congr fun _ _ => by simp_rw [@eq_comm _ b]) (filter_eq s b)
theorem filter_ne [DecidableEq β] (s : Finset β) (b : β) :
(s.filter fun a => b ≠ a) = s.erase b := by
ext
simp only [mem_filter, mem_erase, Ne, decide_not, Bool.not_eq_true', decide_eq_false_iff_not]
tauto
theorem filter_ne' [DecidableEq β] (s : Finset β) (b : β) : (s.filter fun a => a ≠ b) = s.erase b :=
_root_.trans (filter_congr fun _ _ => by simp_rw [@ne_comm _ b]) (filter_ne s b)
theorem filter_union_filter_of_codisjoint (s : Finset α) (h : Codisjoint p q) :
s.filter p ∪ s.filter q = s :=
(filter_or _ _ _).symm.trans <| filter_true_of_mem fun x _ => h.top_le x trivial
theorem filter_union_filter_neg_eq [∀ x, Decidable (¬p x)] (s : Finset α) :
(s.filter p ∪ s.filter fun a => ¬p a) = s :=
filter_union_filter_of_codisjoint _ _ _ <| @codisjoint_hnot_right _ _ p
end
end Filter
/-! ### range -/
section Range
open Nat
variable {n m l : ℕ}
@[simp]
theorem range_filter_eq {n m : ℕ} : (range n).filter (· = m) = if m < n then {m} else ∅ := by
convert filter_eq (range n) m using 2
· ext
rw [eq_comm]
· simp
end Range
end Finset
/-! ### dedup on list and multiset -/
namespace Multiset
variable [DecidableEq α] {s t : Multiset α}
@[simp]
theorem toFinset_add (s t : Multiset α) : toFinset (s + t) = toFinset s ∪ toFinset t :=
Finset.ext <| by simp
@[simp]
theorem toFinset_inter (s t : Multiset α) : toFinset (s ∩ t) = toFinset s ∩ toFinset t :=
Finset.ext <| by simp
@[simp]
theorem toFinset_union (s t : Multiset α) : (s ∪ t).toFinset = s.toFinset ∪ t.toFinset := by
ext; simp
@[simp]
theorem toFinset_eq_empty {m : Multiset α} : m.toFinset = ∅ ↔ m = 0 :=
Finset.val_inj.symm.trans Multiset.dedup_eq_zero
@[simp]
theorem toFinset_nonempty : s.toFinset.Nonempty ↔ s ≠ 0 := by
simp only [toFinset_eq_empty, Ne, Finset.nonempty_iff_ne_empty]
@[aesop safe apply (rule_sets := [finsetNonempty])]
protected alias ⟨_, Aesop.toFinset_nonempty_of_ne⟩ := toFinset_nonempty
@[simp]
theorem toFinset_filter (s : Multiset α) (p : α → Prop) [DecidablePred p] :
Multiset.toFinset (s.filter p) = s.toFinset.filter p := by
ext; simp
end Multiset
namespace List
variable [DecidableEq α] {l l' : List α} {a : α} {f : α → β}
{s : Finset α} {t : Set β} {t' : Finset β}
@[simp]
theorem toFinset_union (l l' : List α) : (l ∪ l').toFinset = l.toFinset ∪ l'.toFinset := by
ext
simp
@[simp]
theorem toFinset_inter (l l' : List α) : (l ∩ l').toFinset = l.toFinset ∩ l'.toFinset := by
ext
simp
@[aesop safe apply (rule_sets := [finsetNonempty])]
alias ⟨_, Aesop.toFinset_nonempty_of_ne⟩ := toFinset_nonempty_iff
@[simp]
theorem toFinset_filter (s : List α) (p : α → Bool) :
(s.filter p).toFinset = s.toFinset.filter (p ·) := by
ext; simp [List.mem_filter]
end List
namespace Finset
section ToList
@[simp]
theorem toList_eq_nil {s : Finset α} : s.toList = [] ↔ s = ∅ :=
Multiset.toList_eq_nil.trans val_eq_zero
theorem empty_toList {s : Finset α} : s.toList.isEmpty ↔ s = ∅ := by simp
@[simp]
theorem toList_empty : (∅ : Finset α).toList = [] :=
toList_eq_nil.mpr rfl
theorem Nonempty.toList_ne_nil {s : Finset α} (hs : s.Nonempty) : s.toList ≠ [] :=
mt toList_eq_nil.mp hs.ne_empty
theorem Nonempty.not_empty_toList {s : Finset α} (hs : s.Nonempty) : ¬s.toList.isEmpty :=
mt empty_toList.mp hs.ne_empty
end ToList
/-! ### choose -/
section Choose
variable (p : α → Prop) [DecidablePred p] (l : Finset α)
/-- Given a finset `l` and a predicate `p`, associate to a proof that there is a unique element of
`l` satisfying `p` this unique element, as an element of the corresponding subtype. -/
def chooseX (hp : ∃! a, a ∈ l ∧ p a) : { a // a ∈ l ∧ p a } :=
Multiset.chooseX p l.val hp
/-- Given a finset `l` and a predicate `p`, associate to a proof that there is a unique element of
`l` satisfying `p` this unique element, as an element of the ambient type. -/
def choose (hp : ∃! a, a ∈ l ∧ p a) : α :=
chooseX p l hp
theorem choose_spec (hp : ∃! a, a ∈ l ∧ p a) : choose p l hp ∈ l ∧ p (choose p l hp) :=
(chooseX p l hp).property
theorem choose_mem (hp : ∃! a, a ∈ l ∧ p a) : choose p l hp ∈ l :=
(choose_spec _ _ _).1
theorem choose_property (hp : ∃! a, a ∈ l ∧ p a) : p (choose p l hp) :=
(choose_spec _ _ _).2
end Choose
end Finset
namespace Equiv
variable [DecidableEq α] {s t : Finset α}
open Finset
/-- The disjoint union of finsets is a sum -/
def Finset.union (s t : Finset α) (h : Disjoint s t) :
s ⊕ t ≃ (s ∪ t : Finset α) :=
Equiv.setCongr (coe_union _ _) |>.trans (Equiv.Set.union (disjoint_coe.mpr h)) |>.symm
@[simp]
theorem Finset.union_symm_inl (h : Disjoint s t) (x : s) :
Equiv.Finset.union s t h (Sum.inl x) = ⟨x, Finset.mem_union.mpr <| Or.inl x.2⟩ :=
rfl
@[simp]
theorem Finset.union_symm_inr (h : Disjoint s t) (y : t) :
Equiv.Finset.union s t h (Sum.inr y) = ⟨y, Finset.mem_union.mpr <| Or.inr y.2⟩ :=
rfl
/-- The type of dependent functions on the disjoint union of finsets `s ∪ t` is equivalent to the
type of pairs of functions on `s` and on `t`. This is similar to `Equiv.sumPiEquivProdPi`. -/
def piFinsetUnion {ι} [DecidableEq ι] (α : ι → Type*) {s t : Finset ι} (h : Disjoint s t) :
((∀ i : s, α i) × ∀ i : t, α i) ≃ ∀ i : (s ∪ t : Finset ι), α i :=
let e := Equiv.Finset.union s t h
sumPiEquivProdPi (fun b ↦ α (e b)) |>.symm.trans (.piCongrLeft (fun i : ↥(s ∪ t) ↦ α i) e)
/-- A finset is equivalent to its coercion as a set. -/
def _root_.Finset.equivToSet (s : Finset α) : s ≃ s.toSet where
toFun a := ⟨a.1, mem_coe.2 a.2⟩
invFun a := ⟨a.1, mem_coe.1 a.2⟩
left_inv := fun _ ↦ rfl
right_inv := fun _ ↦ rfl
end Equiv
namespace Multiset
variable [DecidableEq α]
@[simp]
lemma toFinset_replicate (n : ℕ) (a : α) :
(replicate n a).toFinset = if n = 0 then ∅ else {a} := by
ext x
simp only [mem_toFinset, Finset.mem_singleton, mem_replicate]
split_ifs with hn <;> simp [hn]
end Multiset
| Mathlib/Data/Finset/Basic.lean | 890 | 892 | |
/-
Copyright (c) 2020 Sébastien Gouëzel. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Sébastien Gouëzel
-/
import Mathlib.Algebra.BigOperators.Fin
import Mathlib.Algebra.Order.BigOperators.Group.Finset
import Mathlib.Data.Finset.Sort
/-!
# Compositions
A composition of a natural number `n` is a decomposition `n = i₀ + ... + i_{k-1}` of `n` into a sum
of positive integers. Combinatorially, it corresponds to a decomposition of `{0, ..., n-1}` into
non-empty blocks of consecutive integers, where the `iⱼ` are the lengths of the blocks.
This notion is closely related to that of a partition of `n`, but in a composition of `n` the
order of the `iⱼ`s matters.
We implement two different structures covering these two viewpoints on compositions. The first
one, made of a list of positive integers summing to `n`, is the main one and is called
`Composition n`. The second one is useful for combinatorial arguments (for instance to show that
the number of compositions of `n` is `2^(n-1)`). It is given by a subset of `{0, ..., n}`
containing `0` and `n`, where the elements of the subset (other than `n`) correspond to the leftmost
points of each block. The main API is built on `Composition n`, and we provide an equivalence
between the two types.
## Main functions
* `c : Composition n` is a structure, made of a list of integers which are all positive and
add up to `n`.
* `composition_card` states that the cardinality of `Composition n` is exactly
`2^(n-1)`, which is proved by constructing an equiv with `CompositionAsSet n` (see below), which
is itself in bijection with the subsets of `Fin (n-1)` (this holds even for `n = 0`, where `-` is
nat subtraction).
Let `c : Composition n` be a composition of `n`. Then
* `c.blocks` is the list of blocks in `c`.
* `c.length` is the number of blocks in the composition.
* `c.blocksFun : Fin c.length → ℕ` is the realization of `c.blocks` as a function on
`Fin c.length`. This is the main object when using compositions to understand the composition of
analytic functions.
* `c.sizeUpTo : ℕ → ℕ` is the sum of the size of the blocks up to `i`.;
* `c.embedding i : Fin (c.blocksFun i) → Fin n` is the increasing embedding of the `i`-th block in
`Fin n`;
* `c.index j`, for `j : Fin n`, is the index of the block containing `j`.
* `Composition.ones n` is the composition of `n` made of ones, i.e., `[1, ..., 1]`.
* `Composition.single n (hn : 0 < n)` is the composition of `n` made of a single block of size `n`.
Compositions can also be used to split lists. Let `l` be a list of length `n` and `c` a composition
of `n`.
* `l.splitWrtComposition c` is a list of lists, made of the slices of `l` corresponding to the
blocks of `c`.
* `join_splitWrtComposition` states that splitting a list and then joining it gives back the
original list.
* `splitWrtComposition_join` states that joining a list of lists, and then splitting it back
according to the right composition, gives back the original list of lists.
We turn to the second viewpoint on compositions, that we realize as a finset of `Fin (n+1)`.
`c : CompositionAsSet n` is a structure made of a finset of `Fin (n+1)` called `c.boundaries`
and proofs that it contains `0` and `n`. (Taking a finset of `Fin n` containing `0` would not
make sense in the edge case `n = 0`, while the previous description works in all cases).
The elements of this set (other than `n`) correspond to leftmost points of blocks.
Thus, there is an equiv between `Composition n` and `CompositionAsSet n`. We
only construct basic API on `CompositionAsSet` (notably `c.length` and `c.blocks`) to be able
to construct this equiv, called `compositionEquiv n`. Since there is a straightforward equiv
between `CompositionAsSet n` and finsets of `{1, ..., n-1}` (obtained by removing `0` and `n`
from a `CompositionAsSet` and called `compositionAsSetEquiv n`), we deduce that
`CompositionAsSet n` and `Composition n` are both fintypes of cardinality `2^(n - 1)`
(see `compositionAsSet_card` and `composition_card`).
## Implementation details
The main motivation for this structure and its API is in the construction of the composition of
formal multilinear series, and the proof that the composition of analytic functions is analytic.
The representation of a composition as a list is very handy as lists are very flexible and already
have a well-developed API.
## Tags
Composition, partition
## References
<https://en.wikipedia.org/wiki/Composition_(combinatorics)>
-/
assert_not_exists Field
open List
variable {n : ℕ}
/-- A composition of `n` is a list of positive integers summing to `n`. -/
@[ext]
structure Composition (n : ℕ) where
/-- List of positive integers summing to `n` -/
blocks : List ℕ
/-- Proof of positivity for `blocks` -/
blocks_pos : ∀ {i}, i ∈ blocks → 0 < i
/-- Proof that `blocks` sums to `n` -/
blocks_sum : blocks.sum = n
deriving DecidableEq
attribute [simp] Composition.blocks_sum
/-- Combinatorial viewpoint on a composition of `n`, by seeing it as non-empty blocks of
consecutive integers in `{0, ..., n-1}`. We register every block by its left end-point, yielding
a finset containing `0`. As this does not make sense for `n = 0`, we add `n` to this finset, and
get a finset of `{0, ..., n}` containing `0` and `n`. This is the data in the structure
`CompositionAsSet n`. -/
@[ext]
structure CompositionAsSet (n : ℕ) where
/-- Combinatorial viewpoint on a composition of `n` as consecutive integers `{0, ..., n-1}` -/
boundaries : Finset (Fin n.succ)
/-- Proof that `0` is a member of `boundaries` -/
zero_mem : (0 : Fin n.succ) ∈ boundaries
/-- Last element of the composition -/
getLast_mem : Fin.last n ∈ boundaries
deriving DecidableEq
instance {n : ℕ} : Inhabited (CompositionAsSet n) :=
⟨⟨Finset.univ, Finset.mem_univ _, Finset.mem_univ _⟩⟩
attribute [simp] CompositionAsSet.zero_mem CompositionAsSet.getLast_mem
/-!
### Compositions
A composition of an integer `n` is a decomposition `n = i₀ + ... + i_{k-1}` of `n` into a sum of
positive integers.
-/
namespace Composition
variable (c : Composition n)
instance (n : ℕ) : ToString (Composition n) :=
⟨fun c => toString c.blocks⟩
/-- The length of a composition, i.e., the number of blocks in the composition. -/
abbrev length : ℕ :=
c.blocks.length
theorem blocks_length : c.blocks.length = c.length :=
rfl
/-- The blocks of a composition, seen as a function on `Fin c.length`. When composing analytic
functions using compositions, this is the main player. -/
def blocksFun : Fin c.length → ℕ := c.blocks.get
@[simp]
theorem ofFn_blocksFun : ofFn c.blocksFun = c.blocks :=
ofFn_get _
@[simp]
theorem sum_blocksFun : ∑ i, c.blocksFun i = n := by
conv_rhs => rw [← c.blocks_sum, ← ofFn_blocksFun, sum_ofFn]
@[simp]
theorem blocksFun_mem_blocks (i : Fin c.length) : c.blocksFun i ∈ c.blocks :=
get_mem _ _
theorem one_le_blocks {i : ℕ} (h : i ∈ c.blocks) : 1 ≤ i :=
c.blocks_pos h
theorem blocks_le {i : ℕ} (h : i ∈ c.blocks) : i ≤ n := by
rw [← c.blocks_sum]
exact List.le_sum_of_mem h
@[simp]
theorem one_le_blocks' {i : ℕ} (h : i < c.length) : 1 ≤ c.blocks[i] :=
c.one_le_blocks (get_mem (blocks c) _)
@[simp]
theorem blocks_pos' (i : ℕ) (h : i < c.length) : 0 < c.blocks[i] :=
c.one_le_blocks' h
@[simp]
theorem one_le_blocksFun (i : Fin c.length) : 1 ≤ c.blocksFun i :=
c.one_le_blocks (c.blocksFun_mem_blocks i)
@[simp]
theorem blocksFun_le {n} (c : Composition n) (i : Fin c.length) :
c.blocksFun i ≤ n :=
c.blocks_le <| getElem_mem _
@[simp]
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
@[simp]
theorem blocks_eq_nil : c.blocks = [] ↔ n = 0 := by
constructor
· intro h
simpa using congr(List.sum $h)
· rintro rfl
rw [← length_eq_zero_iff, ← nonpos_iff_eq_zero]
exact c.length_le
protected theorem length_eq_zero : c.length = 0 ↔ n = 0 := by
simp
@[simp]
theorem length_pos_iff : 0 < c.length ↔ 0 < n := by
simp [pos_iff_ne_zero]
alias ⟨_, length_pos_of_pos⟩ := length_pos_iff
/-- The sum of the sizes of the blocks in a composition up to `i`. -/
def sizeUpTo (i : ℕ) : ℕ :=
(c.blocks.take i).sum
@[simp]
theorem sizeUpTo_zero : c.sizeUpTo 0 = 0 := by simp [sizeUpTo]
theorem sizeUpTo_ofLength_le (i : ℕ) (h : c.length ≤ i) : c.sizeUpTo i = n := by
dsimp [sizeUpTo]
convert c.blocks_sum
exact take_of_length_le h
@[simp]
theorem sizeUpTo_length : c.sizeUpTo c.length = n :=
c.sizeUpTo_ofLength_le c.length le_rfl
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 _ _
theorem sizeUpTo_succ {i : ℕ} (h : i < c.length) :
c.sizeUpTo (i + 1) = c.sizeUpTo i + c.blocks[i] := by
simp only [sizeUpTo]
rw [sum_take_succ _ _ h]
theorem sizeUpTo_succ' (i : Fin c.length) :
c.sizeUpTo ((i : ℕ) + 1) = c.sizeUpTo i + c.blocksFun i :=
c.sizeUpTo_succ i.2
theorem sizeUpTo_strict_mono {i : ℕ} (h : i < c.length) : c.sizeUpTo i < c.sizeUpTo (i + 1) := by
rw [c.sizeUpTo_succ h]
simp
theorem monotone_sizeUpTo : Monotone c.sizeUpTo :=
monotone_sum_take _
/-- The `i`-th boundary of a composition, i.e., the leftmost point of the `i`-th block. We include
a virtual point at the right of the last block, to make for a nice equiv with
`CompositionAsSet n`. -/
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
@[simp]
theorem boundary_zero : c.boundary 0 = 0 := by simp [boundary, Fin.ext_iff]
@[simp]
theorem boundary_last : c.boundary (Fin.last c.length) = Fin.last n := by
simp [boundary, Fin.ext_iff]
/-- The boundaries of a composition, i.e., the leftmost point of all the blocks. We include
a virtual point at the right of the last block, to make for a nice equiv with
`CompositionAsSet n`. -/
def boundaries : Finset (Fin (n + 1)) :=
Finset.univ.map c.boundary.toEmbedding
theorem card_boundaries_eq_succ_length : c.boundaries.card = c.length + 1 := by simp [boundaries]
/-- To `c : Composition n`, one can associate a `CompositionAsSet n` by registering the leftmost
point of each block, and adding a virtual point at the right of the last block. -/
def toCompositionAsSet : CompositionAsSet n where
boundaries := c.boundaries
zero_mem := by
simp only [boundaries, Finset.mem_univ, exists_prop_of_true, Finset.mem_map]
exact ⟨0, And.intro True.intro rfl⟩
getLast_mem := by
simp only [boundaries, Finset.mem_univ, exists_prop_of_true, Finset.mem_map]
exact ⟨Fin.last c.length, And.intro True.intro c.boundary_last⟩
/-- The canonical increasing bijection between `Fin (c.length + 1)` and `c.boundaries` is
exactly `c.boundary`. -/
theorem orderEmbOfFin_boundaries :
c.boundaries.orderEmbOfFin c.card_boundaries_eq_succ_length = c.boundary := by
refine (Finset.orderEmbOfFin_unique' _ ?_).symm
exact fun i => (Finset.mem_map' _).2 (Finset.mem_univ _)
/-- Embedding the `i`-th block of a composition (identified with `Fin (c.blocksFun i)`) into
`Fin n` at the relevant position. -/
def embedding (i : Fin c.length) : Fin (c.blocksFun i) ↪o Fin n :=
(Fin.natAddOrderEmb <| c.sizeUpTo i).trans <| Fin.castLEOrderEmb <|
calc
c.sizeUpTo i + c.blocksFun i = c.sizeUpTo (i + 1) := (c.sizeUpTo_succ i.2).symm
_ ≤ c.sizeUpTo c.length := monotone_sum_take _ i.2
_ = n := c.sizeUpTo_length
@[simp]
theorem coe_embedding (i : Fin c.length) (j : Fin (c.blocksFun i)) :
(c.embedding i j : ℕ) = c.sizeUpTo i + j :=
rfl
/-- `index_exists` asserts there is some `i` with `j < c.sizeUpTo (i+1)`.
In the next definition `index` we use `Nat.find` to produce the minimal such index.
-/
theorem index_exists {j : ℕ} (h : j < n) : ∃ i : ℕ, j < c.sizeUpTo (i + 1) ∧ i < c.length := by
have n_pos : 0 < n := lt_of_le_of_lt (zero_le j) h
have : 0 < c.blocks.sum := by rwa [← c.blocks_sum] at n_pos
have length_pos : 0 < c.blocks.length := length_pos_of_sum_pos (blocks c) this
refine ⟨c.length - 1, ?_, Nat.pred_lt (ne_of_gt length_pos)⟩
have : c.length - 1 + 1 = c.length := Nat.succ_pred_eq_of_pos length_pos
simp [this, h]
/-- `c.index j` is the index of the block in the composition `c` containing `j`. -/
def index (j : Fin n) : Fin c.length :=
⟨Nat.find (c.index_exists j.2), (Nat.find_spec (c.index_exists j.2)).2⟩
theorem lt_sizeUpTo_index_succ (j : Fin n) : (j : ℕ) < c.sizeUpTo (c.index j).succ :=
(Nat.find_spec (c.index_exists j.2)).1
theorem sizeUpTo_index_le (j : Fin n) : c.sizeUpTo (c.index j) ≤ j := by
by_contra H
set i := c.index j
push_neg at H
have i_pos : (0 : ℕ) < i := by
by_contra! i_pos
revert H
simp [nonpos_iff_eq_zero.1 i_pos, c.sizeUpTo_zero]
let i₁ := (i : ℕ).pred
have i₁_lt_i : i₁ < i := Nat.pred_lt (ne_of_gt i_pos)
have i₁_succ : i₁ + 1 = i := Nat.succ_pred_eq_of_pos i_pos
have := Nat.find_min (c.index_exists j.2) i₁_lt_i
simp [lt_trans i₁_lt_i (c.index j).2, i₁_succ] at this
exact Nat.lt_le_asymm H this
/-- Mapping an element `j` of `Fin n` to the element in the block containing it, identified with
`Fin (c.blocksFun (c.index j))` through the canonical increasing bijection. -/
def invEmbedding (j : Fin n) : Fin (c.blocksFun (c.index j)) :=
⟨j - c.sizeUpTo (c.index j), by
rw [tsub_lt_iff_right, add_comm, ← sizeUpTo_succ']
· exact lt_sizeUpTo_index_succ _ _
· exact sizeUpTo_index_le _ _⟩
@[simp]
theorem coe_invEmbedding (j : Fin n) : (c.invEmbedding j : ℕ) = j - c.sizeUpTo (c.index j) :=
rfl
theorem embedding_comp_inv (j : Fin n) : c.embedding (c.index j) (c.invEmbedding j) = j := by
rw [Fin.ext_iff]
apply add_tsub_cancel_of_le (c.sizeUpTo_index_le j)
theorem mem_range_embedding_iff {j : Fin n} {i : Fin c.length} :
j ∈ Set.range (c.embedding i) ↔ c.sizeUpTo i ≤ j ∧ (j : ℕ) < c.sizeUpTo (i : ℕ).succ := by
constructor
· intro h
rcases Set.mem_range.2 h with ⟨k, hk⟩
rw [Fin.ext_iff] at hk
dsimp at hk
rw [← hk]
simp [sizeUpTo_succ', k.is_lt]
· intro h
apply Set.mem_range.2
refine ⟨⟨j - c.sizeUpTo i, ?_⟩, ?_⟩
· rw [tsub_lt_iff_left, ← sizeUpTo_succ']
· exact h.2
· exact h.1
· rw [Fin.ext_iff]
exact add_tsub_cancel_of_le h.1
/-- The embeddings of different blocks of a composition are disjoint. -/
theorem disjoint_range {i₁ i₂ : Fin c.length} (h : i₁ ≠ i₂) :
Disjoint (Set.range (c.embedding i₁)) (Set.range (c.embedding i₂)) := by
classical
wlog h' : i₁ < i₂
· exact (this c h.symm (h.lt_or_lt.resolve_left h')).symm
by_contra d
obtain ⟨x, hx₁, hx₂⟩ :
∃ x : Fin n, x ∈ Set.range (c.embedding i₁) ∧ x ∈ Set.range (c.embedding i₂) :=
Set.not_disjoint_iff.1 d
have A : (i₁ : ℕ).succ ≤ i₂ := Nat.succ_le_of_lt h'
apply lt_irrefl (x : ℕ)
calc
(x : ℕ) < c.sizeUpTo (i₁ : ℕ).succ := (c.mem_range_embedding_iff.1 hx₁).2
_ ≤ c.sizeUpTo (i₂ : ℕ) := monotone_sum_take _ A
_ ≤ x := (c.mem_range_embedding_iff.1 hx₂).1
theorem mem_range_embedding (j : Fin n) : j ∈ Set.range (c.embedding (c.index j)) := by
have : c.embedding (c.index j) (c.invEmbedding j) ∈ Set.range (c.embedding (c.index j)) :=
Set.mem_range_self _
rwa [c.embedding_comp_inv j] at this
theorem mem_range_embedding_iff' {j : Fin n} {i : Fin c.length} :
j ∈ Set.range (c.embedding i) ↔ i = c.index j := by
constructor
· rw [← not_imp_not]
intro h
exact Set.disjoint_right.1 (c.disjoint_range h) (c.mem_range_embedding j)
· intro h
rw [h]
exact c.mem_range_embedding j
theorem index_embedding (i : Fin c.length) (j : Fin (c.blocksFun i)) :
c.index (c.embedding i j) = i := by
symm
rw [← mem_range_embedding_iff']
apply Set.mem_range_self
theorem invEmbedding_comp (i : Fin c.length) (j : Fin (c.blocksFun i)) :
(c.invEmbedding (c.embedding i j) : ℕ) = j := by
simp_rw [coe_invEmbedding, index_embedding, coe_embedding, add_tsub_cancel_left]
/-- Equivalence between the disjoint union of the blocks (each of them seen as
`Fin (c.blocksFun i)`) with `Fin n`. -/
def blocksFinEquiv : (Σi : Fin c.length, Fin (c.blocksFun i)) ≃ Fin n where
toFun x := c.embedding x.1 x.2
invFun j := ⟨c.index j, c.invEmbedding j⟩
left_inv x := by
rcases x with ⟨i, y⟩
dsimp
congr; · exact c.index_embedding _ _
rw [Fin.heq_ext_iff]
· exact c.invEmbedding_comp _ _
· rw [c.index_embedding]
right_inv j := c.embedding_comp_inv j
theorem blocksFun_congr {n₁ n₂ : ℕ} (c₁ : Composition n₁) (c₂ : Composition n₂) (i₁ : Fin c₁.length)
(i₂ : Fin c₂.length) (hn : n₁ = n₂) (hc : c₁.blocks = c₂.blocks) (hi : (i₁ : ℕ) = i₂) :
c₁.blocksFun i₁ = c₂.blocksFun i₂ := by
cases hn
rw [← Composition.ext_iff] at hc
cases hc
congr
rwa [Fin.ext_iff]
/-- Two compositions (possibly of different integers) coincide if and only if they have the
same sequence of blocks. -/
theorem sigma_eq_iff_blocks_eq {c : Σ n, Composition n} {c' : Σ n, Composition n} :
c = c' ↔ c.2.blocks = c'.2.blocks := by
refine ⟨fun H => by rw [H], fun H => ?_⟩
rcases c with ⟨n, c⟩
rcases c' with ⟨n', c'⟩
have : n = n' := by rw [← c.blocks_sum, ← c'.blocks_sum, H]
induction this
congr
ext1
exact H
/-! ### The composition `Composition.ones` -/
/-- The composition made of blocks all of size `1`. -/
def ones (n : ℕ) : Composition n :=
⟨replicate n (1 : ℕ), fun {i} hi => by simp [List.eq_of_mem_replicate hi], by simp⟩
instance {n : ℕ} : Inhabited (Composition n) :=
⟨Composition.ones n⟩
@[simp]
theorem ones_length (n : ℕ) : (ones n).length = n :=
List.length_replicate
@[simp]
theorem ones_blocks (n : ℕ) : (ones n).blocks = replicate n (1 : ℕ) :=
rfl
@[simp]
theorem ones_blocksFun (n : ℕ) (i : Fin (ones n).length) : (ones n).blocksFun i = 1 := by
simp only [blocksFun, ones, get_eq_getElem, getElem_replicate]
@[simp]
theorem ones_sizeUpTo (n : ℕ) (i : ℕ) : (ones n).sizeUpTo i = min i n := by
simp [sizeUpTo, ones_blocks, take_replicate]
@[simp]
theorem ones_embedding (i : Fin (ones n).length) (h : 0 < (ones n).blocksFun i) :
(ones n).embedding i ⟨0, h⟩ = ⟨i, lt_of_lt_of_le i.2 (ones n).length_le⟩ := by
ext
simpa using i.2.le
theorem eq_ones_iff {c : Composition n} : c = ones n ↔ ∀ i ∈ c.blocks, i = 1 := by
constructor
· rintro rfl
exact fun i => eq_of_mem_replicate
· intro H
ext1
have A : c.blocks = replicate c.blocks.length 1 := eq_replicate_of_mem H
have : c.blocks.length = n := by
conv_rhs => rw [← c.blocks_sum, A]
simp
rw [A, this, ones_blocks]
theorem ne_ones_iff {c : Composition n} : c ≠ ones n ↔ ∃ i ∈ c.blocks, 1 < i := by
refine (not_congr eq_ones_iff).trans ?_
have : ∀ j ∈ c.blocks, j = 1 ↔ j ≤ 1 := fun j hj => by simp [le_antisymm_iff, c.one_le_blocks hj]
simp +contextual [this]
theorem eq_ones_iff_length {c : Composition n} : c = ones n ↔ c.length = n := by
constructor
· rintro rfl
exact ones_length n
· contrapose
intro H length_n
apply lt_irrefl n
calc
n = ∑ i : Fin c.length, 1 := by simp [length_n]
_ < ∑ i : Fin c.length, c.blocksFun i := by
{
obtain ⟨i, hi, i_blocks⟩ : ∃ i ∈ c.blocks, 1 < i := ne_ones_iff.1 H
rw [← ofFn_blocksFun, mem_ofFn' c.blocksFun, Set.mem_range] at hi
obtain ⟨j : Fin c.length, hj : c.blocksFun j = i⟩ := hi
rw [← hj] at i_blocks
exact Finset.sum_lt_sum (fun i _ => one_le_blocksFun c i) ⟨j, Finset.mem_univ _, i_blocks⟩
}
_ = n := c.sum_blocksFun
theorem eq_ones_iff_le_length {c : Composition n} : c = ones n ↔ n ≤ c.length := by
simp [eq_ones_iff_length, le_antisymm_iff, c.length_le]
/-! ### The composition `Composition.single` -/
/-- The composition made of a single block of size `n`. -/
def single (n : ℕ) (h : 0 < n) : Composition n :=
⟨[n], by simp [h], by simp⟩
@[simp]
theorem single_length {n : ℕ} (h : 0 < n) : (single n h).length = 1 :=
rfl
@[simp]
theorem single_blocks {n : ℕ} (h : 0 < n) : (single n h).blocks = [n] :=
rfl
@[simp]
theorem single_blocksFun {n : ℕ} (h : 0 < n) (i : Fin (single n h).length) :
(single n h).blocksFun i = n := by simp [blocksFun, single, blocks, i.2]
@[simp]
theorem single_embedding {n : ℕ} (h : 0 < n) (i : Fin n) :
((single n h).embedding (0 : Fin 1)) i = i := by
ext
simp
theorem eq_single_iff_length {n : ℕ} (h : 0 < n) {c : Composition n} :
c = single n h ↔ c.length = 1 := by
constructor
· intro H
rw [H]
exact single_length h
· intro H
ext1
have A : c.blocks.length = 1 := H ▸ c.blocks_length
have B : c.blocks.sum = n := c.blocks_sum
rw [eq_cons_of_length_one A] at B ⊢
simpa [single_blocks] using B
theorem ne_single_iff {n : ℕ} (hn : 0 < n) {c : Composition n} :
c ≠ single n hn ↔ ∀ i, c.blocksFun i < n := by
rw [← not_iff_not]
push_neg
constructor
· rintro rfl
exact ⟨⟨0, by simp⟩, by simp⟩
· rintro ⟨i, hi⟩
rw [eq_single_iff_length]
have : ∀ j : Fin c.length, j = i := by
intro j
by_contra ji
apply lt_irrefl (∑ k, c.blocksFun k)
calc
∑ k, c.blocksFun k ≤ c.blocksFun i := by simp only [c.sum_blocksFun, hi]
_ < ∑ k, c.blocksFun k :=
Finset.single_lt_sum ji (Finset.mem_univ _) (Finset.mem_univ _) (c.one_le_blocksFun j)
fun _ _ _ => zero_le _
simpa using Fintype.card_eq_one_of_forall_eq this
variable {m : ℕ}
/-- Change `n` in `(c : Composition n)` to a propositionally equal value. -/
@[simps]
protected def cast (c : Composition m) (hmn : m = n) : Composition n where
__ := c
blocks_sum := c.blocks_sum.trans hmn
@[simp]
theorem cast_rfl (c : Composition n) : c.cast rfl = c := rfl
theorem cast_heq (c : Composition m) (hmn : m = n) : HEq (c.cast hmn) c := by subst m; rfl
theorem cast_eq_cast (c : Composition m) (hmn : m = n) :
c.cast hmn = cast (hmn ▸ rfl) c := by
subst m
rfl
/-- Append two compositions to get a composition of the sum of numbers. -/
@[simps]
def append (c₁ : Composition m) (c₂ : Composition n) : Composition (m + n) where
blocks := c₁.blocks ++ c₂.blocks
blocks_pos := by
intro i hi
rw [mem_append] at hi
exact hi.elim c₁.blocks_pos c₂.blocks_pos
blocks_sum := by simp
/-- Reverse the order of blocks in a composition. -/
@[simps]
def reverse (c : Composition n) : Composition n where
blocks := c.blocks.reverse
blocks_pos hi := c.blocks_pos (mem_reverse.mp hi)
blocks_sum := by simp [List.sum_reverse]
@[simp]
lemma reverse_reverse (c : Composition n) : c.reverse.reverse = c :=
Composition.ext <| List.reverse_reverse _
lemma reverse_involutive : Function.Involutive (@reverse n) := reverse_reverse
lemma reverse_bijective : Function.Bijective (@reverse n) := reverse_involutive.bijective
lemma reverse_injective : Function.Injective (@reverse n) := reverse_involutive.injective
lemma reverse_surjective : Function.Surjective (@reverse n) := reverse_involutive.surjective
@[simp]
lemma reverse_inj {c₁ c₂ : Composition n} : c₁.reverse = c₂.reverse ↔ c₁ = c₂ :=
reverse_injective.eq_iff
@[simp]
lemma reverse_ones : (ones n).reverse = ones n := by ext1; simp
@[simp]
lemma reverse_single (hn : 0 < n) : (single n hn).reverse = single n hn := by ext1; simp
@[simp]
lemma reverse_eq_ones {c : Composition n} : c.reverse = ones n ↔ c = ones n :=
reverse_injective.eq_iff' reverse_ones
@[simp]
lemma reverse_eq_single {hn : 0 < n} {c : Composition n} :
c.reverse = single n hn ↔ c = single n hn :=
reverse_injective.eq_iff' <| reverse_single _
lemma reverse_append (c₁ : Composition m) (c₂ : Composition n) :
reverse (append c₁ c₂) = (append c₂.reverse c₁.reverse).cast (add_comm _ _) :=
Composition.ext <| by simp
/-- Induction (recursion) principle on `c : Composition _`
that corresponds to the usual induction on the list of blocks of `c`. -/
@[elab_as_elim]
def recOnSingleAppend {motive : ∀ n, Composition n → Sort*} {n : ℕ} (c : Composition n)
(zero : motive 0 (ones 0))
(single_append : ∀ k n c, motive n c →
motive (k + 1 + n) (append (single (k + 1) k.succ_pos) c)) :
motive n c :=
match n, c with
| _, ⟨blocks, blocks_pos, rfl⟩ =>
match blocks with
| [] => zero
| 0 :: _ => by simp at blocks_pos
| (k + 1) :: l =>
single_append k l.sum ⟨l, fun hi ↦ blocks_pos <| mem_cons_of_mem _ hi, rfl⟩ <|
recOnSingleAppend _ zero single_append
decreasing_by simp
/-- Induction (recursion) principle on `c : Composition _`
that corresponds to the reverse induction on the list of blocks of `c`. -/
@[elab_as_elim]
def recOnAppendSingle {motive : ∀ n, Composition n → Sort*} {n : ℕ} (c : Composition n)
(zero : motive 0 (ones 0))
(append_single : ∀ k n c, motive n c →
motive (n + (k + 1)) (append c (single (k + 1) k.succ_pos))) :
motive n c :=
reverse_reverse c ▸ c.reverse.recOnSingleAppend zero fun k n c ih ↦ by
convert append_single k n c.reverse ih using 1
· apply add_comm
· rw [reverse_append, reverse_single]
apply cast_heq
end Composition
/-!
### Splitting a list
Given a list of length `n` and a composition `c` of `n`, one can split `l` into `c.length` sublists
of respective lengths `c.blocksFun 0`, ..., `c.blocksFun (c.length-1)`. This is inverse to the
join operation.
-/
namespace List
variable {α : Type*}
/-- Auxiliary for `List.splitWrtComposition`. -/
def splitWrtCompositionAux : List α → List ℕ → List (List α)
| _, [] => []
| l, n::ns =>
let (l₁, l₂) := l.splitAt n
l₁::splitWrtCompositionAux l₂ ns
/-- Given a list of length `n` and a composition `[i₁, ..., iₖ]` of `n`, split `l` into a list of
`k` lists corresponding to the blocks of the composition, of respective lengths `i₁`, ..., `iₖ`.
This makes sense mostly when `n = l.length`, but this is not necessary for the definition. -/
| def splitWrtComposition (l : List α) (c : Composition n) : List (List α) :=
splitWrtCompositionAux l c.blocks
@[local simp]
theorem splitWrtCompositionAux_cons (l : List α) (n ns) :
l.splitWrtCompositionAux (n::ns) = take n l::(drop n l).splitWrtCompositionAux ns := by
simp [splitWrtCompositionAux]
theorem length_splitWrtCompositionAux (l : List α) (ns) :
length (l.splitWrtCompositionAux ns) = ns.length := by
induction ns generalizing l
· simp [splitWrtCompositionAux, *]
| Mathlib/Combinatorics/Enumerative/Composition.lean | 700 | 711 |
/-
Copyright (c) 2021 Martin Zinkevich. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johannes Hölzl, Martin Zinkevich, Rémy Degenne
-/
import Mathlib.Logic.Encodable.Lattice
import Mathlib.MeasureTheory.MeasurableSpace.Defs
import Mathlib.Order.Disjointed
/-!
# Induction principles for measurable sets, related to π-systems and λ-systems.
## Main statements
* The main theorem of this file is Dynkin's π-λ theorem, which appears
here as an induction principle `induction_on_inter`. Suppose `s` is a
collection of subsets of `α` such that the intersection of two members
of `s` belongs to `s` whenever it is nonempty. Let `m` be the σ-algebra
generated by `s`. In order to check that a predicate `C` holds on every
member of `m`, it suffices to check that `C` holds on the members of `s` and
that `C` is preserved by complementation and *disjoint* countable
unions.
* The proof of this theorem relies on the notion of `IsPiSystem`, i.e., a collection of sets
which is closed under binary non-empty intersections. Note that this is a small variation around
the usual notion in the literature, which often requires that a π-system is non-empty, and closed
also under disjoint intersections. This variation turns out to be convenient for the
formalization.
* The proof of Dynkin's π-λ theorem also requires the notion of `DynkinSystem`, i.e., a collection
of sets which contains the empty set, is closed under complementation and under countable union
of pairwise disjoint sets. The disjointness condition is the only difference with `σ`-algebras.
* `generatePiSystem g` gives the minimal π-system containing `g`.
This can be considered a Galois insertion into both measurable spaces and sets.
* `generateFrom_generatePiSystem_eq` proves that if you start from a collection of sets `g`,
take the generated π-system, and then the generated σ-algebra, you get the same result as
the σ-algebra generated from `g`. This is useful because there are connections between
independent sets that are π-systems and the generated independent spaces.
* `mem_generatePiSystem_iUnion_elim` and `mem_generatePiSystem_iUnion_elim'` show that any
element of the π-system generated from the union of a set of π-systems can be
represented as the intersection of a finite number of elements from these sets.
* `piiUnionInter` defines a new π-system from a family of π-systems `π : ι → Set (Set α)` and a
set of indices `S : Set ι`. `piiUnionInter π S` is the set of sets that can be written
as `⋂ x ∈ t, f x` for some finset `t ∈ S` and sets `f x ∈ π x`.
## Implementation details
* `IsPiSystem` is a predicate, not a type. Thus, we don't explicitly define the galois
insertion, nor do we define a complete lattice. In theory, we could define a complete
lattice and galois insertion on the subtype corresponding to `IsPiSystem`.
-/
open MeasurableSpace Set
open MeasureTheory
variable {α β : Type*}
/-- A π-system is a collection of subsets of `α` that is closed under binary intersection of
non-disjoint sets. Usually it is also required that the collection is nonempty, but we don't do
that here. -/
def IsPiSystem (C : Set (Set α)) : Prop :=
∀ᵉ (s ∈ C) (t ∈ C), (s ∩ t : Set α).Nonempty → s ∩ t ∈ C
namespace MeasurableSpace
theorem isPiSystem_measurableSet {α : Type*} [MeasurableSpace α] :
IsPiSystem { s : Set α | MeasurableSet s } := fun _ hs _ ht _ => hs.inter ht
end MeasurableSpace
theorem IsPiSystem.singleton (S : Set α) : IsPiSystem ({S} : Set (Set α)) := by
intro s h_s t h_t _
rw [Set.mem_singleton_iff.1 h_s, Set.mem_singleton_iff.1 h_t, Set.inter_self,
Set.mem_singleton_iff]
theorem IsPiSystem.insert_empty {S : Set (Set α)} (h_pi : IsPiSystem S) :
IsPiSystem (insert ∅ S) := by
intro s hs t ht hst
rcases hs with hs | hs
· simp [hs]
· rcases ht with ht | ht
· simp [ht]
· exact Set.mem_insert_of_mem _ (h_pi s hs t ht hst)
theorem IsPiSystem.insert_univ {S : Set (Set α)} (h_pi : IsPiSystem S) :
IsPiSystem (insert Set.univ S) := by
intro s hs t ht hst
rcases hs with hs | hs
| · rcases ht with ht | ht <;> simp [hs, ht]
· rcases ht with ht | ht
· simp [hs, ht]
· exact Set.mem_insert_of_mem _ (h_pi s hs t ht hst)
theorem IsPiSystem.comap {α β} {S : Set (Set β)} (h_pi : IsPiSystem S) (f : α → β) :
IsPiSystem { s : Set α | ∃ t ∈ S, f ⁻¹' t = s } := by
rintro _ ⟨s, hs_mem, rfl⟩ _ ⟨t, ht_mem, rfl⟩ hst
| Mathlib/MeasureTheory/PiSystem.lean | 95 | 102 |
/-
Copyright (c) 2023 Jz Pan. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Jz Pan
-/
import Mathlib.FieldTheory.SplittingField.Construction
import Mathlib.FieldTheory.IsAlgClosed.AlgebraicClosure
import Mathlib.FieldTheory.Separable
import Mathlib.FieldTheory.Normal.Closure
import Mathlib.RingTheory.AlgebraicIndependent.Adjoin
import Mathlib.RingTheory.AlgebraicIndependent.TranscendenceBasis
import Mathlib.RingTheory.Polynomial.SeparableDegree
import Mathlib.RingTheory.Polynomial.UniqueFactorization
/-!
# Separable degree
This file contains basics about the separable degree of a field extension.
## Main definitions
- `Field.Emb F E`: the type of `F`-algebra homomorphisms from `E` to the algebraic closure of `E`
(the algebraic closure of `F` is usually used in the literature, but our definition has the
advantage that `Field.Emb F E` lies in the same universe as `E` rather than the maximum over `F`
and `E`). Usually denoted by $\operatorname{Emb}_F(E)$ in textbooks.
- `Field.finSepDegree F E`: the (finite) separable degree $[E:F]_s$ of an extension `E / F`
of fields, defined to be the number of `F`-algebra homomorphisms from `E` to the algebraic
closure of `E`, as a natural number. It is zero if `Field.Emb F E` is not finite.
Note that if `E / F` is not algebraic, then this definition makes no mathematical sense.
**Remark:** the `Cardinal`-valued, potentially infinite separable degree `Field.sepDegree F E`
for a general algebraic extension `E / F` is defined to be the degree of `L / F`, where `L` is
the separable closure of `F` in `E`, which is not defined in this file yet. Later we
will show that (`Field.finSepDegree_eq`), if `Field.Emb F E` is finite, then these two
definitions coincide. If `E / F` is algebraic with infinite separable degree, we have
`#(Field.Emb F E) = 2 ^ Field.sepDegree F E` instead.
(See `Field.Emb.cardinal_eq_two_pow_sepDegree` in another file.) For example, if
$F = \mathbb{Q}$ and $E = \mathbb{Q}( \mu_{p^\infty} )$, then $\operatorname{Emb}_F (E)$
is in bijection with $\operatorname{Gal}(E/F)$, which is isomorphic to
$\mathbb{Z}_p^\times$, which is uncountable, whereas $ [E:F] $ is countable.
- `Polynomial.natSepDegree`: the separable degree of a polynomial is a natural number,
defined to be the number of distinct roots of it over its splitting field.
## Main results
- `Field.embEquivOfEquiv`, `Field.finSepDegree_eq_of_equiv`:
a random bijection between `Field.Emb F E` and `Field.Emb F K` when `E` and `K` are isomorphic
as `F`-algebras. In particular, they have the same cardinality (so their
`Field.finSepDegree` are equal).
- `Field.embEquivOfAdjoinSplits`,
`Field.finSepDegree_eq_of_adjoin_splits`: a random bijection between `Field.Emb F E` and
`E →ₐ[F] K` if `E = F(S)` such that every element `s` of `S` is integral (= algebraic) over `F`
and whose minimal polynomial splits in `K`. In particular, they have the same cardinality.
- `Field.embEquivOfIsAlgClosed`,
`Field.finSepDegree_eq_of_isAlgClosed`: a random bijection between `Field.Emb F E` and
`E →ₐ[F] K` when `E / F` is algebraic and `K / F` is algebraically closed.
In particular, they have the same cardinality.
- `Field.embProdEmbOfIsAlgebraic`, `Field.finSepDegree_mul_finSepDegree_of_isAlgebraic`:
if `K / E / F` is a field extension tower, such that `K / E` is algebraic,
then there is a non-canonical bijection `Field.Emb F E × Field.Emb E K ≃ Field.Emb F K`.
In particular, the separable degrees satisfy the tower law: $[E:F]_s [K:E]_s = [K:F]_s$
(see also `Module.finrank_mul_finrank`).
- `Field.infinite_emb_of_transcendental`: `Field.Emb` is infinite for transcendental extensions.
- `Polynomial.natSepDegree_le_natDegree`: the separable degree of a polynomial is smaller than
its degree.
- `Polynomial.natSepDegree_eq_natDegree_iff`: the separable degree of a non-zero polynomial is
equal to its degree if and only if it is separable.
- `Polynomial.natSepDegree_eq_of_splits`: if a polynomial splits over `E`, then its separable degree
is equal to the number of distinct roots of it over `E`.
- `Polynomial.natSepDegree_eq_of_isAlgClosed`: the separable degree of a polynomial is equal to
the number of distinct roots of it over any algebraically closed field.
- `Polynomial.natSepDegree_expand`: if a field `F` is of exponential characteristic
`q`, then `Polynomial.expand F (q ^ n) f` and `f` have the same separable degree.
- `Polynomial.HasSeparableContraction.natSepDegree_eq`: if a polynomial has separable
contraction, then its separable degree is equal to its separable contraction degree.
- `Irreducible.natSepDegree_dvd_natDegree`: the separable degree of an irreducible
polynomial divides its degree.
- `IntermediateField.finSepDegree_adjoin_simple_eq_natSepDegree`: the separable degree of
`F⟮α⟯ / F` is equal to the separable degree of the minimal polynomial of `α` over `F`.
- `IntermediateField.finSepDegree_adjoin_simple_eq_finrank_iff`: if `α` is algebraic over `F`, then
the separable degree of `F⟮α⟯ / F` is equal to the degree of `F⟮α⟯ / F` if and only if `α` is a
separable element.
- `Field.finSepDegree_dvd_finrank`: the separable degree of any field extension `E / F` divides
the degree of `E / F`.
- `Field.finSepDegree_le_finrank`: the separable degree of a finite extension `E / F` is smaller
than the degree of `E / F`.
- `Field.finSepDegree_eq_finrank_iff`: if `E / F` is a finite extension, then its separable degree
is equal to its degree if and only if it is a separable extension.
- `IntermediateField.isSeparable_adjoin_simple_iff_isSeparable`: `F⟮x⟯ / F` is a separable extension
if and only if `x` is a separable element.
- `Algebra.IsSeparable.trans`: if `E / F` and `K / E` are both separable, then `K / F` is also
separable.
## Tags
separable degree, degree, polynomial
-/
open Module Polynomial IntermediateField Field
noncomputable section
universe u v w
variable (F : Type u) (E : Type v) [Field F] [Field E] [Algebra F E]
variable (K : Type w) [Field K] [Algebra F K]
namespace Field
/-- `Field.Emb F E` is the type of `F`-algebra homomorphisms from `E` to the algebraic closure
of `E`. -/
abbrev Emb := E →ₐ[F] AlgebraicClosure E
/-- If `E / F` is an algebraic extension, then the (finite) separable degree of `E / F`
is the number of `F`-algebra homomorphisms from `E` to the algebraic closure of `E`,
as a natural number. It is defined to be zero if there are infinitely many of them.
Note that if `E / F` is not algebraic, then this definition makes no mathematical sense. -/
def finSepDegree : ℕ := Nat.card (Emb F E)
instance instInhabitedEmb : Inhabited (Emb F E) := ⟨IsScalarTower.toAlgHom F E _⟩
instance instNeZeroFinSepDegree [FiniteDimensional F E] : NeZero (finSepDegree F E) :=
⟨Nat.card_ne_zero.2 ⟨inferInstance, Fintype.finite <| minpoly.AlgHom.fintype _ _ _⟩⟩
/-- A random bijection between `Field.Emb F E` and `Field.Emb F K` when `E` and `K` are isomorphic
as `F`-algebras. -/
def embEquivOfEquiv (i : E ≃ₐ[F] K) :
Emb F E ≃ Emb F K := AlgEquiv.arrowCongr i <| AlgEquiv.symm <| by
let _ : Algebra E K := i.toAlgHom.toRingHom.toAlgebra
have : Algebra.IsAlgebraic E K := by
constructor
intro x
have h := isAlgebraic_algebraMap (R := E) (A := K) (i.symm.toAlgHom x)
rw [show ∀ y : E, (algebraMap E K) y = i.toAlgHom y from fun y ↦ rfl] at h
simpa only [AlgEquiv.toAlgHom_eq_coe, AlgHom.coe_coe, AlgEquiv.apply_symm_apply] using h
apply AlgEquiv.restrictScalars (R := F) (S := E)
exact IsAlgClosure.equivOfAlgebraic E K (AlgebraicClosure K) (AlgebraicClosure E)
/-- If `E` and `K` are isomorphic as `F`-algebras, then they have the same `Field.finSepDegree`
over `F`. -/
theorem finSepDegree_eq_of_equiv (i : E ≃ₐ[F] K) :
finSepDegree F E = finSepDegree F K := Nat.card_congr (embEquivOfEquiv F E K i)
@[simp]
theorem finSepDegree_self : finSepDegree F F = 1 := by
have : Cardinal.mk (Emb F F) = 1 := le_antisymm
(Cardinal.le_one_iff_subsingleton.2 AlgHom.subsingleton)
(Cardinal.one_le_iff_ne_zero.2 <| Cardinal.mk_ne_zero _)
rw [finSepDegree, Nat.card, this, Cardinal.one_toNat]
end Field
namespace IntermediateField
@[simp]
theorem finSepDegree_bot : finSepDegree F (⊥ : IntermediateField F E) = 1 := by
rw [finSepDegree_eq_of_equiv _ _ _ (botEquiv F E), finSepDegree_self]
section Tower
variable {F}
variable [Algebra E K] [IsScalarTower F E K]
@[simp]
theorem finSepDegree_bot' : finSepDegree F (⊥ : IntermediateField E K) = finSepDegree F E :=
finSepDegree_eq_of_equiv _ _ _ ((botEquiv E K).restrictScalars F)
@[simp]
theorem finSepDegree_top : finSepDegree F (⊤ : IntermediateField E K) = finSepDegree F K :=
finSepDegree_eq_of_equiv _ _ _ ((topEquiv (F := E) (E := K)).restrictScalars F)
end Tower
end IntermediateField
namespace Field
/-- A random bijection between `Field.Emb F E` and `E →ₐ[F] K` if `E = F(S)` such that every
element `s` of `S` is integral (= algebraic) over `F` and whose minimal polynomial splits in `K`.
Combined with `Field.instInhabitedEmb`, it can be viewed as a stronger version of
`IntermediateField.nonempty_algHom_of_adjoin_splits`. -/
def embEquivOfAdjoinSplits {S : Set E} (hS : adjoin F S = ⊤)
(hK : ∀ s ∈ S, IsIntegral F s ∧ Splits (algebraMap F K) (minpoly F s)) :
Emb F E ≃ (E →ₐ[F] K) :=
have : Algebra.IsAlgebraic F (⊤ : IntermediateField F E) :=
(hS ▸ isAlgebraic_adjoin (S := S) fun x hx ↦ (hK x hx).1)
have halg := (topEquiv (F := F) (E := E)).isAlgebraic
Classical.choice <| Function.Embedding.antisymm
(halg.algHomEmbeddingOfSplits (fun _ ↦ splits_of_mem_adjoin F E (S := S) hK (hS ▸ mem_top)) _)
(halg.algHomEmbeddingOfSplits (fun _ ↦ IsAlgClosed.splits_codomain _) _)
/-- The `Field.finSepDegree F E` is equal to the cardinality of `E →ₐ[F] K`
if `E = F(S)` such that every element
`s` of `S` is integral (= algebraic) over `F` and whose minimal polynomial splits in `K`. -/
theorem finSepDegree_eq_of_adjoin_splits {S : Set E} (hS : adjoin F S = ⊤)
(hK : ∀ s ∈ S, IsIntegral F s ∧ Splits (algebraMap F K) (minpoly F s)) :
finSepDegree F E = Nat.card (E →ₐ[F] K) := Nat.card_congr (embEquivOfAdjoinSplits F E K hS hK)
/-- A random bijection between `Field.Emb F E` and `E →ₐ[F] K` when `E / F` is algebraic
and `K / F` is algebraically closed. -/
def embEquivOfIsAlgClosed [Algebra.IsAlgebraic F E] [IsAlgClosed K] :
Emb F E ≃ (E →ₐ[F] K) :=
embEquivOfAdjoinSplits F E K (adjoin_univ F E) fun s _ ↦
⟨Algebra.IsIntegral.isIntegral s, IsAlgClosed.splits_codomain _⟩
/-- The `Field.finSepDegree F E` is equal to the cardinality of `E →ₐ[F] K` as a natural number,
when `E / F` is algebraic and `K / F` is algebraically closed. -/
@[stacks 09HJ "We use `finSepDegree` to state a more general result."]
theorem finSepDegree_eq_of_isAlgClosed [Algebra.IsAlgebraic F E] [IsAlgClosed K] :
finSepDegree F E = Nat.card (E →ₐ[F] K) := Nat.card_congr (embEquivOfIsAlgClosed F E K)
/-- If `K / E / F` is a field extension tower, such that `K / E` is algebraic,
then there is a non-canonical bijection
`Field.Emb F E × Field.Emb E K ≃ Field.Emb F K`. A corollary of `algHomEquivSigma`. -/
def embProdEmbOfIsAlgebraic [Algebra E K] [IsScalarTower F E K] [Algebra.IsAlgebraic E K] :
Emb F E × Emb E K ≃ Emb F K :=
let e : ∀ f : E →ₐ[F] AlgebraicClosure K,
@AlgHom E K _ _ _ _ _ f.toRingHom.toAlgebra ≃ Emb E K := fun f ↦
(@embEquivOfIsAlgClosed E K _ _ _ _ _ f.toRingHom.toAlgebra).symm
(algHomEquivSigma (A := F) (B := E) (C := K) (D := AlgebraicClosure K) |>.trans
(Equiv.sigmaEquivProdOfEquiv e) |>.trans <| Equiv.prodCongrLeft <|
fun _ : Emb E K ↦ AlgEquiv.arrowCongr (@AlgEquiv.refl F E _ _ _) <|
(IsAlgClosure.equivOfAlgebraic E K (AlgebraicClosure K)
(AlgebraicClosure E)).restrictScalars F).symm
/-- If the field extension `E / F` is transcendental, then `Field.Emb F E` is infinite. -/
instance infinite_emb_of_transcendental [H : Algebra.Transcendental F E] : Infinite (Emb F E) := by
obtain ⟨ι, x, hx⟩ := exists_isTranscendenceBasis' F E
have := hx.isAlgebraic_field
rw [← (embProdEmbOfIsAlgebraic F (adjoin F (Set.range x)) E).infinite_iff]
refine @Prod.infinite_of_left _ _ ?_ _
rw [← (embEquivOfEquiv _ _ _ hx.1.aevalEquivField).infinite_iff]
obtain ⟨i⟩ := hx.nonempty_iff_transcendental.2 H
let K := FractionRing (MvPolynomial ι F)
let i1 := IsScalarTower.toAlgHom F (MvPolynomial ι F) (AlgebraicClosure K)
have hi1 : Function.Injective i1 := by
rw [IsScalarTower.coe_toAlgHom', IsScalarTower.algebraMap_eq _ K]
exact (algebraMap K (AlgebraicClosure K)).injective.comp (IsFractionRing.injective _ _)
let f (n : ℕ) : Emb F K := IsFractionRing.liftAlgHom
(g := i1.comp <| MvPolynomial.aeval fun i : ι ↦ MvPolynomial.X i ^ (n + 1)) <| hi1.comp <| by
simpa [algebraicIndependent_iff_injective_aeval] using
MvPolynomial.algebraicIndependent_polynomial_aeval_X _
fun i : ι ↦ (Polynomial.transcendental_X F).pow n.succ_pos
refine Infinite.of_injective f fun m n h ↦ ?_
replace h : (MvPolynomial.X i) ^ (m + 1) = (MvPolynomial.X i) ^ (n + 1) := hi1 <| by
simpa [f, -map_pow] using congr($h (algebraMap _ K (MvPolynomial.X (R := F) i)))
simpa using congr(MvPolynomial.totalDegree $h)
/-- If the field extension `E / F` is transcendental, then `Field.finSepDegree F E = 0`, which
actually means that `Field.Emb F E` is infinite (see `Field.infinite_emb_of_transcendental`). -/
theorem finSepDegree_eq_zero_of_transcendental [Algebra.Transcendental F E] :
finSepDegree F E = 0 := Nat.card_eq_zero_of_infinite
/-- If `K / E / F` is a field extension tower, such that `K / E` is algebraic, then their
separable degrees satisfy the tower law
$[E:F]_s [K:E]_s = [K:F]_s$. See also `Module.finrank_mul_finrank`. -/
@[stacks 09HK "Part 1, `finSepDegree` variant"]
theorem finSepDegree_mul_finSepDegree_of_isAlgebraic
[Algebra E K] [IsScalarTower F E K] [Algebra.IsAlgebraic E K] :
finSepDegree F E * finSepDegree E K = finSepDegree F K := by
simpa only [Nat.card_prod] using Nat.card_congr (embProdEmbOfIsAlgebraic F E K)
end Field
namespace Polynomial
variable {F E}
variable (f : F[X])
open Classical in
/-- The separable degree `Polynomial.natSepDegree` of a polynomial is a natural number,
defined to be the number of distinct roots of it over its splitting field.
This is similar to `Polynomial.natDegree` but not to `Polynomial.degree`, namely, the separable
degree of `0` is `0`, not negative infinity. -/
def natSepDegree : ℕ := (f.aroots f.SplittingField).toFinset.card
/-- The separable degree of a polynomial is smaller than its degree. -/
theorem natSepDegree_le_natDegree : f.natSepDegree ≤ f.natDegree := by
have := f.map (algebraMap F f.SplittingField) |>.card_roots'
rw [← aroots_def, natDegree_map] at this
classical
exact (f.aroots f.SplittingField).toFinset_card_le.trans this
@[simp]
theorem natSepDegree_X_sub_C (x : F) : (X - C x).natSepDegree = 1 := by
simp only [natSepDegree, aroots_X_sub_C, Multiset.toFinset_singleton, Finset.card_singleton]
@[simp]
theorem natSepDegree_X : (X : F[X]).natSepDegree = 1 := by
simp only [natSepDegree, aroots_X, Multiset.toFinset_singleton, Finset.card_singleton]
/-- A constant polynomial has zero separable degree. -/
theorem natSepDegree_eq_zero (h : f.natDegree = 0) : f.natSepDegree = 0 := by
linarith only [natSepDegree_le_natDegree f, h]
@[simp]
theorem natSepDegree_C (x : F) : (C x).natSepDegree = 0 := natSepDegree_eq_zero _ (natDegree_C _)
@[simp]
theorem natSepDegree_zero : (0 : F[X]).natSepDegree = 0 := by
rw [← C_0, natSepDegree_C]
@[simp]
theorem natSepDegree_one : (1 : F[X]).natSepDegree = 0 := by
rw [← C_1, natSepDegree_C]
/-- A non-constant polynomial has non-zero separable degree. -/
theorem natSepDegree_ne_zero (h : f.natDegree ≠ 0) : f.natSepDegree ≠ 0 := by
rw [natSepDegree, ne_eq, Finset.card_eq_zero, ← ne_eq, ← Finset.nonempty_iff_ne_empty]
use rootOfSplits _ (SplittingField.splits f) (ne_of_apply_ne _ h)
classical
rw [Multiset.mem_toFinset, mem_aroots]
exact ⟨ne_of_apply_ne _ h, map_rootOfSplits _ (SplittingField.splits f) (ne_of_apply_ne _ h)⟩
/-- A polynomial has zero separable degree if and only if it is constant. -/
theorem natSepDegree_eq_zero_iff : f.natSepDegree = 0 ↔ f.natDegree = 0 :=
⟨(natSepDegree_ne_zero f).mtr, natSepDegree_eq_zero f⟩
/-- A polynomial has non-zero separable degree if and only if it is non-constant. -/
theorem natSepDegree_ne_zero_iff : f.natSepDegree ≠ 0 ↔ f.natDegree ≠ 0 :=
Iff.not <| natSepDegree_eq_zero_iff f
/-- The separable degree of a non-zero polynomial is equal to its degree if and only if
it is separable. -/
| theorem natSepDegree_eq_natDegree_iff (hf : f ≠ 0) :
f.natSepDegree = f.natDegree ↔ f.Separable := by
classical
| Mathlib/FieldTheory/SeparableDegree.lean | 347 | 349 |
/-
Copyright (c) 2020 Simon Hudon. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Simon Hudon, Ira Fesefeldt
-/
import Mathlib.Control.Monad.Basic
import Mathlib.Dynamics.FixedPoints.Basic
import Mathlib.Order.CompleteLattice.Basic
import Mathlib.Order.Iterate
import Mathlib.Order.Part
import Mathlib.Order.Preorder.Chain
import Mathlib.Order.ScottContinuity
/-!
# Omega Complete Partial Orders
An omega-complete partial order is a partial order with a supremum
operation on increasing sequences indexed by natural numbers (which we
call `ωSup`). In this sense, it is strictly weaker than join complete
semi-lattices as only ω-sized totally ordered sets have a supremum.
The concept of an omega-complete partial order (ωCPO) is useful for the
formalization of the semantics of programming languages. Its notion of
supremum helps define the meaning of recursive procedures.
## Main definitions
* class `OmegaCompletePartialOrder`
* `ite`, `map`, `bind`, `seq` as continuous morphisms
## Instances of `OmegaCompletePartialOrder`
* `Part`
* every `CompleteLattice`
* pi-types
* product types
* `OrderHom`
* `ContinuousHom` (with notation →𝒄)
* an instance of `OmegaCompletePartialOrder (α →𝒄 β)`
* `ContinuousHom.ofFun`
* `ContinuousHom.ofMono`
* continuous functions:
* `id`
* `ite`
* `const`
* `Part.bind`
* `Part.map`
* `Part.seq`
## References
* [Chain-complete posets and directed sets with applications][markowsky1976]
* [Recursive definitions of partial functions and their computations][cadiou1972]
* [Semantics of Programming Languages: Structures and Techniques][gunter1992]
-/
assert_not_exists OrderedCommMonoid
universe u v
variable {ι : Sort*} {α β γ δ : Type*}
namespace OmegaCompletePartialOrder
/-- A chain is a monotone sequence.
See the definition on page 114 of [gunter1992]. -/
def Chain (α : Type u) [Preorder α] :=
ℕ →o α
namespace Chain
variable [Preorder α] [Preorder β] [Preorder γ]
instance : FunLike (Chain α) ℕ α := inferInstanceAs <| FunLike (ℕ →o α) ℕ α
instance : OrderHomClass (Chain α) ℕ α := inferInstanceAs <| OrderHomClass (ℕ →o α) ℕ α
instance [Inhabited α] : Inhabited (Chain α) :=
⟨⟨default, fun _ _ _ => le_rfl⟩⟩
instance : Membership α (Chain α) :=
⟨fun (c : ℕ →o α) a => ∃ i, a = c i⟩
variable (c c' : Chain α)
variable (f : α →o β)
variable (g : β →o γ)
instance : LE (Chain α) where le x y := ∀ i, ∃ j, x i ≤ y j
lemma isChain_range : IsChain (· ≤ ·) (Set.range c) := Monotone.isChain_range (OrderHomClass.mono c)
lemma directed : Directed (· ≤ ·) c := directedOn_range.2 c.isChain_range.directedOn
/-- `map` function for `Chain` -/
-- Porting note: `simps` doesn't work with type synonyms
-- @[simps! -fullyApplied]
def map : Chain β :=
f.comp c
@[simp] theorem map_coe : ⇑(map c f) = f ∘ c := rfl
variable {f}
theorem mem_map (x : α) : x ∈ c → f x ∈ Chain.map c f :=
fun ⟨i, h⟩ => ⟨i, h.symm ▸ rfl⟩
theorem exists_of_mem_map {b : β} : b ∈ c.map f → ∃ a, a ∈ c ∧ f a = b :=
fun ⟨i, h⟩ => ⟨c i, ⟨i, rfl⟩, h.symm⟩
@[simp]
theorem mem_map_iff {b : β} : b ∈ c.map f ↔ ∃ a, a ∈ c ∧ f a = b :=
⟨exists_of_mem_map _, fun h => by
rcases h with ⟨w, h, h'⟩
subst b
apply mem_map c _ h⟩
@[simp]
theorem map_id : c.map OrderHom.id = c :=
OrderHom.comp_id _
theorem map_comp : (c.map f).map g = c.map (g.comp f) :=
rfl
@[mono]
theorem map_le_map {g : α →o β} (h : f ≤ g) : c.map f ≤ c.map g :=
fun i => by simp only [map_coe, Function.comp_apply]; exists i; apply h
/-- `OmegaCompletePartialOrder.Chain.zip` pairs up the elements of two chains
that have the same index. -/
-- Porting note: `simps` doesn't work with type synonyms
-- @[simps!]
def zip (c₀ : Chain α) (c₁ : Chain β) : Chain (α × β) :=
OrderHom.prod c₀ c₁
@[simp] theorem zip_coe (c₀ : Chain α) (c₁ : Chain β) (n : ℕ) : c₀.zip c₁ n = (c₀ n, c₁ n) := rfl
/-- An example of a `Chain` constructed from an ordered pair. -/
def pair (a b : α) (hab : a ≤ b) : Chain α where
toFun
| 0 => a
| _ => b
monotone' _ _ _ := by aesop
@[simp] lemma pair_zero (a b : α) (hab) : pair a b hab 0 = a := rfl
@[simp] lemma pair_succ (a b : α) (hab) (n : ℕ) : pair a b hab (n + 1) = b := rfl
@[simp] lemma range_pair (a b : α) (hab) : Set.range (pair a b hab) = {a, b} := by
ext; exact Nat.or_exists_add_one.symm.trans (by aesop)
@[simp] lemma pair_zip_pair (a₁ a₂ : α) (b₁ b₂ : β) (ha hb) :
(pair a₁ a₂ ha).zip (pair b₁ b₂ hb) = pair (a₁, b₁) (a₂, b₂) (Prod.le_def.2 ⟨ha, hb⟩) := by
unfold Chain; ext n : 2; cases n <;> rfl
end Chain
end OmegaCompletePartialOrder
open OmegaCompletePartialOrder
/-- An omega-complete partial order is a partial order with a supremum
operation on increasing sequences indexed by natural numbers (which we
call `ωSup`). In this sense, it is strictly weaker than join complete
semi-lattices as only ω-sized totally ordered sets have a supremum.
See the definition on page 114 of [gunter1992]. -/
class OmegaCompletePartialOrder (α : Type*) extends PartialOrder α where
/-- The supremum of an increasing sequence -/
ωSup : Chain α → α
/-- `ωSup` is an upper bound of the increasing sequence -/
le_ωSup : ∀ c : Chain α, ∀ i, c i ≤ ωSup c
/-- `ωSup` is a lower bound of the set of upper bounds of the increasing sequence -/
ωSup_le : ∀ (c : Chain α) (x), (∀ i, c i ≤ x) → ωSup c ≤ x
namespace OmegaCompletePartialOrder
variable [OmegaCompletePartialOrder α]
/-- Transfer an `OmegaCompletePartialOrder` on `β` to an `OmegaCompletePartialOrder` on `α`
using a strictly monotone function `f : β →o α`, a definition of ωSup and a proof that `f` is
continuous with regard to the provided `ωSup` and the ωCPO on `α`. -/
protected abbrev lift [PartialOrder β] (f : β →o α) (ωSup₀ : Chain β → β)
(h : ∀ x y, f x ≤ f y → x ≤ y) (h' : ∀ c, f (ωSup₀ c) = ωSup (c.map f)) :
OmegaCompletePartialOrder β where
ωSup := ωSup₀
ωSup_le c x hx := h _ _ (by rw [h']; apply ωSup_le; intro i; apply f.monotone (hx i))
le_ωSup c i := h _ _ (by rw [h']; apply le_ωSup (c.map f))
theorem le_ωSup_of_le {c : Chain α} {x : α} (i : ℕ) (h : x ≤ c i) : x ≤ ωSup c :=
le_trans h (le_ωSup c _)
theorem ωSup_total {c : Chain α} {x : α} (h : ∀ i, c i ≤ x ∨ x ≤ c i) : ωSup c ≤ x ∨ x ≤ ωSup c :=
by_cases
(fun (this : ∀ i, c i ≤ x) => Or.inl (ωSup_le _ _ this))
(fun (this : ¬∀ i, c i ≤ x) =>
have : ∃ i, ¬c i ≤ x := by simp only [not_forall] at this ⊢; assumption
let ⟨i, hx⟩ := this
have : x ≤ c i := (h i).resolve_left hx
Or.inr <| le_ωSup_of_le _ this)
@[mono]
theorem ωSup_le_ωSup_of_le {c₀ c₁ : Chain α} (h : c₀ ≤ c₁) : ωSup c₀ ≤ ωSup c₁ :=
(ωSup_le _ _) fun i => by
obtain ⟨_, h⟩ := h i
exact le_trans h (le_ωSup _ _)
@[simp] theorem ωSup_le_iff {c : Chain α} {x : α} : ωSup c ≤ x ↔ ∀ i, c i ≤ x := by
constructor <;> intros
· trans ωSup c
· exact le_ωSup _ _
· assumption
exact ωSup_le _ _ ‹_›
lemma isLUB_range_ωSup (c : Chain α) : IsLUB (Set.range c) (ωSup c) := by
constructor
· simp only [upperBounds, Set.mem_range, forall_exists_index, forall_apply_eq_imp_iff,
Set.mem_setOf_eq]
exact fun a ↦ le_ωSup c a
· simp only [lowerBounds, upperBounds, Set.mem_range, forall_exists_index,
forall_apply_eq_imp_iff, Set.mem_setOf_eq]
exact fun ⦃a⦄ a_1 ↦ ωSup_le c a a_1
lemma ωSup_eq_of_isLUB {c : Chain α} {a : α} (h : IsLUB (Set.range c) a) : a = ωSup c := by
rw [le_antisymm_iff]
simp only [IsLUB, IsLeast, upperBounds, lowerBounds, Set.mem_range, forall_exists_index,
forall_apply_eq_imp_iff, Set.mem_setOf_eq] at h
constructor
· apply h.2
exact fun a ↦ le_ωSup c a
· rw [ωSup_le_iff]
apply h.1
/-- A subset `p : α → Prop` of the type closed under `ωSup` induces an
`OmegaCompletePartialOrder` on the subtype `{a : α // p a}`. -/
def subtype {α : Type*} [OmegaCompletePartialOrder α] (p : α → Prop)
(hp : ∀ c : Chain α, (∀ i ∈ c, p i) → p (ωSup c)) : OmegaCompletePartialOrder (Subtype p) :=
OmegaCompletePartialOrder.lift (OrderHom.Subtype.val p)
(fun c => ⟨ωSup _, hp (c.map (OrderHom.Subtype.val p)) fun _ ⟨n, q⟩ => q.symm ▸ (c n).2⟩)
(fun _ _ h => h) (fun _ => rfl)
section Continuity
open Chain
variable [OmegaCompletePartialOrder β]
variable [OmegaCompletePartialOrder γ]
variable {f : α → β} {g : β → γ}
/-- A function `f` between `ω`-complete partial orders is `ωScottContinuous` if it is
Scott continuous over chains. -/
def ωScottContinuous (f : α → β) : Prop :=
ScottContinuousOn (Set.range fun c : Chain α => Set.range c) f
lemma _root_.ScottContinuous.ωScottContinuous (hf : ScottContinuous f) : ωScottContinuous f :=
hf.scottContinuousOn
lemma ωScottContinuous.monotone (h : ωScottContinuous f) : Monotone f :=
ScottContinuousOn.monotone _ (fun a b hab => by
use pair a b hab; exact range_pair a b hab) h
lemma ωScottContinuous.isLUB {c : Chain α} (hf : ωScottContinuous f) :
IsLUB (Set.range (c.map ⟨f, hf.monotone⟩)) (f (ωSup c)) := by
simpa [map_coe, OrderHom.coe_mk, Set.range_comp]
using hf (by simp) (Set.range_nonempty _) (isChain_range c).directedOn (isLUB_range_ωSup c)
lemma ωScottContinuous.id : ωScottContinuous (id : α → α) := ScottContinuousOn.id
lemma ωScottContinuous.map_ωSup (hf : ωScottContinuous f) (c : Chain α) :
f (ωSup c) = ωSup (c.map ⟨f, hf.monotone⟩) := ωSup_eq_of_isLUB hf.isLUB
/-- `ωScottContinuous f` asserts that `f` is both monotone and distributes over ωSup. -/
lemma ωScottContinuous_iff_monotone_map_ωSup :
ωScottContinuous f ↔ ∃ hf : Monotone f, ∀ c : Chain α, f (ωSup c) = ωSup (c.map ⟨f, hf⟩) := by
refine ⟨fun hf ↦ ⟨hf.monotone, hf.map_ωSup⟩, ?_⟩
intro hf _ ⟨c, hc⟩ _ _ _ hda
convert isLUB_range_ωSup (c.map { toFun := f, monotone' := hf.1 })
· rw [map_coe, OrderHom.coe_mk, ← hc, ← (Set.range_comp f ⇑c)]
· rw [← hc] at hda
rw [← hf.2 c, ωSup_eq_of_isLUB hda]
alias ⟨ωScottContinuous.monotone_map_ωSup, ωScottContinuous.of_monotone_map_ωSup⟩ :=
ωScottContinuous_iff_monotone_map_ωSup
/- A monotone function `f : α →o β` is ωScott continuous if and only if it distributes over ωSup. -/
lemma ωScottContinuous_iff_map_ωSup_of_orderHom {f : α →o β} :
ωScottContinuous f ↔ ∀ c : Chain α, f (ωSup c) = ωSup (c.map f) := by
rw [ωScottContinuous_iff_monotone_map_ωSup]
exact exists_prop_of_true f.monotone'
alias ⟨ωScottContinuous.map_ωSup_of_orderHom, ωScottContinuous.of_map_ωSup_of_orderHom⟩ :=
ωScottContinuous_iff_map_ωSup_of_orderHom
lemma ωScottContinuous.comp (hg : ωScottContinuous g) (hf : ωScottContinuous f) :
ωScottContinuous (g.comp f) :=
ωScottContinuous.of_monotone_map_ωSup
⟨hg.monotone.comp hf.monotone, by simp [hf.map_ωSup, hg.map_ωSup, map_comp]⟩
lemma ωScottContinuous.const {x : β} : ωScottContinuous (Function.const α x) := by
simp [ωScottContinuous, ScottContinuousOn, Set.range_nonempty]
end Continuity
end OmegaCompletePartialOrder
namespace Part
open OmegaCompletePartialOrder
theorem eq_of_chain {c : Chain (Part α)} {a b : α} (ha : some a ∈ c) (hb : some b ∈ c) : a = b := by
obtain ⟨i, ha⟩ := ha; replace ha := ha.symm
obtain ⟨j, hb⟩ := hb; replace hb := hb.symm
rw [eq_some_iff] at ha hb
rcases le_total i j with hij | hji
· have := c.monotone hij _ ha; apply mem_unique this hb
· have := c.monotone hji _ hb; apply Eq.symm; apply mem_unique this ha
open Classical in
/-- The (noncomputable) `ωSup` definition for the `ω`-CPO structure on `Part α`. -/
protected noncomputable def ωSup (c : Chain (Part α)) : Part α :=
if h : ∃ a, some a ∈ c then some (Classical.choose h) else none
theorem ωSup_eq_some {c : Chain (Part α)} {a : α} (h : some a ∈ c) : Part.ωSup c = some a :=
have : ∃ a, some a ∈ c := ⟨a, h⟩
have a' : some (Classical.choose this) ∈ c := Classical.choose_spec this
calc
Part.ωSup c = some (Classical.choose this) := dif_pos this
_ = some a := congr_arg _ (eq_of_chain a' h)
| Mathlib/Order/OmegaCompletePartialOrder.lean | 324 | 324 | |
/-
Copyright (c) 2019 Anne Baanen. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Anne Baanen, Lu-Ming Zhang
-/
import Mathlib.Data.Matrix.Invertible
import Mathlib.Data.Matrix.Kronecker
import Mathlib.LinearAlgebra.FiniteDimensional.Basic
import Mathlib.LinearAlgebra.Matrix.Adjugate
import Mathlib.LinearAlgebra.Matrix.SemiringInverse
import Mathlib.LinearAlgebra.Matrix.ToLin
import Mathlib.LinearAlgebra.Matrix.Trace
/-!
# Nonsingular inverses
In this file, we define an inverse for square matrices of invertible determinant.
For matrices that are not square or not of full rank, there is a more general notion of
pseudoinverses which we do not consider here.
The definition of inverse used in this file is the adjugate divided by the determinant.
We show that dividing the adjugate by `det A` (if possible), giving a matrix `A⁻¹` (`nonsing_inv`),
will result in a multiplicative inverse to `A`.
Note that there are at least three different inverses in mathlib:
* `A⁻¹` (`Inv.inv`): alone, this satisfies no properties, although it is usually used in
conjunction with `Group` or `GroupWithZero`. On matrices, this is defined to be zero when no
inverse exists.
* `⅟A` (`invOf`): this is only available in the presence of `[Invertible A]`, which guarantees an
inverse exists.
* `Ring.inverse A`: this is defined on any `MonoidWithZero`, and just like `⁻¹` on matrices, is
defined to be zero when no inverse exists.
We start by working with `Invertible`, and show the main results:
* `Matrix.invertibleOfDetInvertible`
* `Matrix.detInvertibleOfInvertible`
* `Matrix.isUnit_iff_isUnit_det`
* `Matrix.mul_eq_one_comm`
After this we define `Matrix.inv` and show it matches `⅟A` and `Ring.inverse A`.
The rest of the results in the file are then about `A⁻¹`
## References
* https://en.wikipedia.org/wiki/Cramer's_rule#Finding_inverse_matrix
## Tags
matrix inverse, cramer, cramer's rule, adjugate
-/
namespace Matrix
universe u u' v
variable {l : Type*} {m : Type u} {n : Type u'} {α : Type v}
open Matrix Equiv Equiv.Perm Finset
/-! ### Matrices are `Invertible` iff their determinants are -/
section Invertible
variable [Fintype n] [DecidableEq n] [CommRing α]
variable (A : Matrix n n α) (B : Matrix n n α)
/-- If `A.det` has a constructive inverse, produce one for `A`. -/
def invertibleOfDetInvertible [Invertible A.det] : Invertible A where
invOf := ⅟ A.det • A.adjugate
mul_invOf_self := by
rw [mul_smul_comm, mul_adjugate, smul_smul, invOf_mul_self, one_smul]
invOf_mul_self := by
rw [smul_mul_assoc, adjugate_mul, smul_smul, invOf_mul_self, one_smul]
theorem invOf_eq [Invertible A.det] [Invertible A] : ⅟ A = ⅟ A.det • A.adjugate := by
letI := invertibleOfDetInvertible A
convert (rfl : ⅟ A = _)
/-- `A.det` is invertible if `A` has a left inverse. -/
def detInvertibleOfLeftInverse (h : B * A = 1) : Invertible A.det where
invOf := B.det
mul_invOf_self := by rw [mul_comm, ← det_mul, h, det_one]
invOf_mul_self := by rw [← det_mul, h, det_one]
/-- `A.det` is invertible if `A` has a right inverse. -/
def detInvertibleOfRightInverse (h : A * B = 1) : Invertible A.det where
invOf := B.det
mul_invOf_self := by rw [← det_mul, h, det_one]
invOf_mul_self := by rw [mul_comm, ← det_mul, h, det_one]
/-- If `A` has a constructive inverse, produce one for `A.det`. -/
def detInvertibleOfInvertible [Invertible A] : Invertible A.det :=
detInvertibleOfLeftInverse A (⅟ A) (invOf_mul_self _)
theorem det_invOf [Invertible A] [Invertible A.det] : (⅟ A).det = ⅟ A.det := by
letI := detInvertibleOfInvertible A
convert (rfl : _ = ⅟ A.det)
/-- Together `Matrix.detInvertibleOfInvertible` and `Matrix.invertibleOfDetInvertible` form an
equivalence, although both sides of the equiv are subsingleton anyway. -/
@[simps]
def invertibleEquivDetInvertible : Invertible A ≃ Invertible A.det where
toFun := @detInvertibleOfInvertible _ _ _ _ _ A
invFun := @invertibleOfDetInvertible _ _ _ _ _ A
left_inv _ := Subsingleton.elim _ _
right_inv _ := Subsingleton.elim _ _
/-- Given a proof that `A.det` has a constructive inverse, lift `A` to `(Matrix n n α)ˣ` -/
def unitOfDetInvertible [Invertible A.det] : (Matrix n n α)ˣ :=
@unitOfInvertible _ _ A (invertibleOfDetInvertible A)
/-- When lowered to a prop, `Matrix.invertibleEquivDetInvertible` forms an `iff`. -/
theorem isUnit_iff_isUnit_det : IsUnit A ↔ IsUnit A.det := by
simp only [← nonempty_invertible_iff_isUnit, (invertibleEquivDetInvertible A).nonempty_congr]
@[simp]
theorem isUnits_det_units (A : (Matrix n n α)ˣ) : IsUnit (A : Matrix n n α).det :=
isUnit_iff_isUnit_det _ |>.mp A.isUnit
/-! #### Variants of the statements above with `IsUnit` -/
theorem isUnit_det_of_invertible [Invertible A] : IsUnit A.det :=
@isUnit_of_invertible _ _ _ (detInvertibleOfInvertible A)
variable {A B}
theorem isUnit_det_of_left_inverse (h : B * A = 1) : IsUnit A.det :=
@isUnit_of_invertible _ _ _ (detInvertibleOfLeftInverse _ _ h)
theorem isUnit_det_of_right_inverse (h : A * B = 1) : IsUnit A.det :=
@isUnit_of_invertible _ _ _ (detInvertibleOfRightInverse _ _ h)
theorem det_ne_zero_of_left_inverse [Nontrivial α] (h : B * A = 1) : A.det ≠ 0 :=
(isUnit_det_of_left_inverse h).ne_zero
theorem det_ne_zero_of_right_inverse [Nontrivial α] (h : A * B = 1) : A.det ≠ 0 :=
(isUnit_det_of_right_inverse h).ne_zero
end Invertible
section Inv
variable [Fintype n] [DecidableEq n] [CommRing α]
variable (A : Matrix n n α) (B : Matrix n n α)
theorem isUnit_det_transpose (h : IsUnit A.det) : IsUnit Aᵀ.det := by
rw [det_transpose]
exact h
/-! ### A noncomputable `Inv` instance -/
/-- The inverse of a square matrix, when it is invertible (and zero otherwise). -/
noncomputable instance inv : Inv (Matrix n n α) :=
⟨fun A => Ring.inverse A.det • A.adjugate⟩
theorem inv_def (A : Matrix n n α) : A⁻¹ = Ring.inverse A.det • A.adjugate :=
rfl
theorem nonsing_inv_apply_not_isUnit (h : ¬IsUnit A.det) : A⁻¹ = 0 := by
rw [inv_def, Ring.inverse_non_unit _ h, zero_smul]
theorem nonsing_inv_apply (h : IsUnit A.det) : A⁻¹ = (↑h.unit⁻¹ : α) • A.adjugate := by
rw [inv_def, ← Ring.inverse_unit h.unit, IsUnit.unit_spec]
/-- The nonsingular inverse is the same as `invOf` when `A` is invertible. -/
@[simp]
theorem invOf_eq_nonsing_inv [Invertible A] : ⅟ A = A⁻¹ := by
letI := detInvertibleOfInvertible A
rw [inv_def, Ring.inverse_invertible, invOf_eq]
/-- Coercing the result of `Units.instInv` is the same as coercing first and applying the
nonsingular inverse. -/
@[simp, norm_cast]
theorem coe_units_inv (A : (Matrix n n α)ˣ) : ↑A⁻¹ = (A⁻¹ : Matrix n n α) := by
letI := A.invertible
rw [← invOf_eq_nonsing_inv, invOf_units]
/-- The nonsingular inverse is the same as the general `Ring.inverse`. -/
theorem nonsing_inv_eq_ringInverse : A⁻¹ = Ring.inverse A := by
by_cases h_det : IsUnit A.det
· cases (A.isUnit_iff_isUnit_det.mpr h_det).nonempty_invertible
rw [← invOf_eq_nonsing_inv, Ring.inverse_invertible]
· have h := mt A.isUnit_iff_isUnit_det.mp h_det
rw [Ring.inverse_non_unit _ h, nonsing_inv_apply_not_isUnit A h_det]
@[deprecated (since := "2025-04-22")]
alias nonsing_inv_eq_ring_inverse := nonsing_inv_eq_ringInverse
theorem transpose_nonsing_inv : A⁻¹ᵀ = Aᵀ⁻¹ := by
rw [inv_def, inv_def, transpose_smul, det_transpose, adjugate_transpose]
theorem conjTranspose_nonsing_inv [StarRing α] : A⁻¹ᴴ = Aᴴ⁻¹ := by
rw [inv_def, inv_def, conjTranspose_smul, det_conjTranspose, adjugate_conjTranspose,
Ring.inverse_star]
/-- The `nonsing_inv` of `A` is a right inverse. -/
@[simp]
theorem mul_nonsing_inv (h : IsUnit A.det) : A * A⁻¹ = 1 := by
cases (A.isUnit_iff_isUnit_det.mpr h).nonempty_invertible
rw [← invOf_eq_nonsing_inv, mul_invOf_self]
/-- The `nonsing_inv` of `A` is a left inverse. -/
@[simp]
theorem nonsing_inv_mul (h : IsUnit A.det) : A⁻¹ * A = 1 := by
cases (A.isUnit_iff_isUnit_det.mpr h).nonempty_invertible
rw [← invOf_eq_nonsing_inv, invOf_mul_self]
instance [Invertible A] : Invertible A⁻¹ := by
rw [← invOf_eq_nonsing_inv]
infer_instance
@[simp]
theorem inv_inv_of_invertible [Invertible A] : A⁻¹⁻¹ = A := by
simp only [← invOf_eq_nonsing_inv, invOf_invOf]
@[simp]
theorem mul_nonsing_inv_cancel_right (B : Matrix m n α) (h : IsUnit A.det) : B * A * A⁻¹ = B := by
simp [Matrix.mul_assoc, mul_nonsing_inv A h]
@[simp]
theorem mul_nonsing_inv_cancel_left (B : Matrix n m α) (h : IsUnit A.det) : A * (A⁻¹ * B) = B := by
simp [← Matrix.mul_assoc, mul_nonsing_inv A h]
@[simp]
theorem nonsing_inv_mul_cancel_right (B : Matrix m n α) (h : IsUnit A.det) : B * A⁻¹ * A = B := by
simp [Matrix.mul_assoc, nonsing_inv_mul A h]
@[simp]
theorem nonsing_inv_mul_cancel_left (B : Matrix n m α) (h : IsUnit A.det) : A⁻¹ * (A * B) = B := by
simp [← Matrix.mul_assoc, nonsing_inv_mul A h]
@[simp]
theorem mul_inv_of_invertible [Invertible A] : A * A⁻¹ = 1 :=
mul_nonsing_inv A (isUnit_det_of_invertible A)
@[simp]
theorem inv_mul_of_invertible [Invertible A] : A⁻¹ * A = 1 :=
nonsing_inv_mul A (isUnit_det_of_invertible A)
@[simp]
theorem mul_inv_cancel_right_of_invertible (B : Matrix m n α) [Invertible A] : B * A * A⁻¹ = B :=
mul_nonsing_inv_cancel_right A B (isUnit_det_of_invertible A)
@[simp]
theorem mul_inv_cancel_left_of_invertible (B : Matrix n m α) [Invertible A] : A * (A⁻¹ * B) = B :=
mul_nonsing_inv_cancel_left A B (isUnit_det_of_invertible A)
@[simp]
theorem inv_mul_cancel_right_of_invertible (B : Matrix m n α) [Invertible A] : B * A⁻¹ * A = B :=
nonsing_inv_mul_cancel_right A B (isUnit_det_of_invertible A)
@[simp]
theorem inv_mul_cancel_left_of_invertible (B : Matrix n m α) [Invertible A] : A⁻¹ * (A * B) = B :=
nonsing_inv_mul_cancel_left A B (isUnit_det_of_invertible A)
theorem inv_mul_eq_iff_eq_mul_of_invertible (A B C : Matrix n n α) [Invertible A] :
A⁻¹ * B = C ↔ B = A * C :=
⟨fun h => by rw [← h, mul_inv_cancel_left_of_invertible],
fun h => by rw [h, inv_mul_cancel_left_of_invertible]⟩
theorem mul_inv_eq_iff_eq_mul_of_invertible (A B C : Matrix n n α) [Invertible A] :
B * A⁻¹ = C ↔ B = C * A :=
⟨fun h => by rw [← h, inv_mul_cancel_right_of_invertible],
fun h => by rw [h, mul_inv_cancel_right_of_invertible]⟩
lemma inv_mulVec_eq_vec {A : Matrix n n α} [Invertible A]
{u v : n → α} (hM : u = A.mulVec v) : A⁻¹.mulVec u = v := by
rw [hM, Matrix.mulVec_mulVec, Matrix.inv_mul_of_invertible, Matrix.one_mulVec]
lemma mul_right_injective_of_invertible [Invertible A] :
Function.Injective (fun (x : Matrix n m α) => A * x) :=
fun _ _ h => by simpa only [inv_mul_cancel_left_of_invertible] using congr_arg (A⁻¹ * ·) h
lemma mul_left_injective_of_invertible [Invertible A] :
Function.Injective (fun (x : Matrix m n α) => x * A) :=
fun a x hax => by simpa only [mul_inv_cancel_right_of_invertible] using congr_arg (· * A⁻¹) hax
lemma mul_right_inj_of_invertible [Invertible A] {x y : Matrix n m α} : A * x = A * y ↔ x = y :=
(mul_right_injective_of_invertible A).eq_iff
lemma mul_left_inj_of_invertible [Invertible A] {x y : Matrix m n α} : x * A = y * A ↔ x = y :=
(mul_left_injective_of_invertible A).eq_iff
| end Inv
| Mathlib/LinearAlgebra/Matrix/NonsingularInverse.lean | 291 | 292 |
/-
Copyright (c) 2019 Johannes Hölzl. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johannes Hölzl, Patrick Massot, Casper Putz, Anne Baanen
-/
import Mathlib.Algebra.Algebra.Subalgebra.Tower
import Mathlib.Data.Finite.Sum
import Mathlib.Data.Matrix.Block
import Mathlib.Data.Matrix.Notation
import Mathlib.LinearAlgebra.Basis.Basic
import Mathlib.LinearAlgebra.Basis.Fin
import Mathlib.LinearAlgebra.Basis.Prod
import Mathlib.LinearAlgebra.Basis.SMul
import Mathlib.LinearAlgebra.Matrix.StdBasis
import Mathlib.RingTheory.AlgebraTower
import Mathlib.RingTheory.Ideal.Span
/-!
# Linear maps and matrices
This file defines the maps to send matrices to a linear map,
and to send linear maps between modules with a finite bases
to matrices. This defines a linear equivalence between linear maps
between finite-dimensional vector spaces and matrices indexed by
the respective bases.
## Main definitions
In the list below, and in all this file, `R` is a commutative ring (semiring
is sometimes enough), `M` and its variations are `R`-modules, `ι`, `κ`, `n` and `m` are finite
types used for indexing.
* `LinearMap.toMatrix`: given bases `v₁ : ι → M₁` and `v₂ : κ → M₂`,
the `R`-linear equivalence from `M₁ →ₗ[R] M₂` to `Matrix κ ι R`
* `Matrix.toLin`: the inverse of `LinearMap.toMatrix`
* `LinearMap.toMatrix'`: the `R`-linear equivalence from `(m → R) →ₗ[R] (n → R)`
to `Matrix m n R` (with the standard basis on `m → R` and `n → R`)
* `Matrix.toLin'`: the inverse of `LinearMap.toMatrix'`
* `algEquivMatrix`: given a basis indexed by `n`, the `R`-algebra equivalence between
`R`-endomorphisms of `M` and `Matrix n n R`
## Issues
This file was originally written without attention to non-commutative rings,
and so mostly only works in the commutative setting. This should be fixed.
In particular, `Matrix.mulVec` gives us a linear equivalence
`Matrix m n R ≃ₗ[R] (n → R) →ₗ[Rᵐᵒᵖ] (m → R)`
while `Matrix.vecMul` gives us a linear equivalence
`Matrix m n R ≃ₗ[Rᵐᵒᵖ] (m → R) →ₗ[R] (n → R)`.
At present, the first equivalence is developed in detail but only for commutative rings
(and we omit the distinction between `Rᵐᵒᵖ` and `R`),
while the second equivalence is developed only in brief, but for not-necessarily-commutative rings.
Naming is slightly inconsistent between the two developments.
In the original (commutative) development `linear` is abbreviated to `lin`,
although this is not consistent with the rest of mathlib.
In the new (non-commutative) development `linear` is not abbreviated, and declarations use `_right`
to indicate they use the right action of matrices on vectors (via `Matrix.vecMul`).
When the two developments are made uniform, the names should be made uniform, too,
by choosing between `linear` and `lin` consistently,
and (presumably) adding `_left` where necessary.
## Tags
linear_map, matrix, linear_equiv, diagonal, det, trace
-/
noncomputable section
open LinearMap Matrix Set Submodule
section ToMatrixRight
variable {R : Type*} [Semiring R]
variable {l m n : Type*}
/-- `Matrix.vecMul M` is a linear map. -/
def Matrix.vecMulLinear [Fintype m] (M : Matrix m n R) : (m → R) →ₗ[R] n → R where
toFun x := x ᵥ* M
map_add' _ _ := funext fun _ ↦ add_dotProduct _ _ _
map_smul' _ _ := funext fun _ ↦ smul_dotProduct _ _ _
@[simp] theorem Matrix.vecMulLinear_apply [Fintype m] (M : Matrix m n R) (x : m → R) :
M.vecMulLinear x = x ᵥ* M := rfl
theorem Matrix.coe_vecMulLinear [Fintype m] (M : Matrix m n R) :
(M.vecMulLinear : _ → _) = M.vecMul := rfl
variable [Fintype m]
theorem range_vecMulLinear (M : Matrix m n R) :
LinearMap.range M.vecMulLinear = span R (range M.row) := by
letI := Classical.decEq m
simp_rw [range_eq_map, ← iSup_range_single, Submodule.map_iSup, range_eq_map, ←
Ideal.span_singleton_one, Ideal.span, Submodule.map_span, image_image, image_singleton,
Matrix.vecMulLinear_apply, iSup_span, range_eq_iUnion, iUnion_singleton_eq_range,
LinearMap.single, LinearMap.coe_mk, AddHom.coe_mk, row_def]
unfold vecMul
simp_rw [single_dotProduct, one_mul]
theorem Matrix.vecMul_injective_iff {R : Type*} [Ring R] {M : Matrix m n R} :
Function.Injective M.vecMul ↔ LinearIndependent R M.row := by
rw [← coe_vecMulLinear]
simp only [← LinearMap.ker_eq_bot, Fintype.linearIndependent_iff, Submodule.eq_bot_iff,
LinearMap.mem_ker, vecMulLinear_apply, row_def]
refine ⟨fun h c h0 ↦ congr_fun <| h c ?_, fun h c h0 ↦ funext <| h c ?_⟩
· rw [← h0]
ext i
simp [vecMul, dotProduct]
· rw [← h0]
ext j
simp [vecMul, dotProduct]
lemma Matrix.linearIndependent_rows_of_isUnit {R : Type*} [Ring R] {A : Matrix m m R}
[DecidableEq m] (ha : IsUnit A) : LinearIndependent R A.row := by
rw [← Matrix.vecMul_injective_iff]
exact Matrix.vecMul_injective_of_isUnit ha
section
variable [DecidableEq m]
/-- Linear maps `(m → R) →ₗ[R] (n → R)` are linearly equivalent over `Rᵐᵒᵖ` to `Matrix m n R`,
by having matrices act by right multiplication.
-/
def LinearMap.toMatrixRight' : ((m → R) →ₗ[R] n → R) ≃ₗ[Rᵐᵒᵖ] Matrix m n R where
toFun f i j := f (single R (fun _ ↦ R) i 1) j
invFun := Matrix.vecMulLinear
right_inv M := by
ext i j
simp
left_inv f := by
apply (Pi.basisFun R m).ext
intro j; ext i
simp
map_add' f g := by
ext i j
simp only [Pi.add_apply, LinearMap.add_apply, Matrix.add_apply]
map_smul' c f := by
ext i j
simp only [Pi.smul_apply, LinearMap.smul_apply, RingHom.id_apply, Matrix.smul_apply]
/-- A `Matrix m n R` is linearly equivalent over `Rᵐᵒᵖ` to a linear map `(m → R) →ₗ[R] (n → R)`,
by having matrices act by right multiplication. -/
abbrev Matrix.toLinearMapRight' [DecidableEq m] : Matrix m n R ≃ₗ[Rᵐᵒᵖ] (m → R) →ₗ[R] n → R :=
LinearEquiv.symm LinearMap.toMatrixRight'
@[simp]
theorem Matrix.toLinearMapRight'_apply (M : Matrix m n R) (v : m → R) :
(Matrix.toLinearMapRight') M v = v ᵥ* M := rfl
@[simp]
theorem Matrix.toLinearMapRight'_mul [Fintype l] [DecidableEq l] (M : Matrix l m R)
(N : Matrix m n R) :
Matrix.toLinearMapRight' (M * N) =
(Matrix.toLinearMapRight' N).comp (Matrix.toLinearMapRight' M) :=
LinearMap.ext fun _x ↦ (vecMul_vecMul _ M N).symm
theorem Matrix.toLinearMapRight'_mul_apply [Fintype l] [DecidableEq l] (M : Matrix l m R)
(N : Matrix m n R) (x) :
Matrix.toLinearMapRight' (M * N) x =
Matrix.toLinearMapRight' N (Matrix.toLinearMapRight' M x) :=
(vecMul_vecMul _ M N).symm
@[simp]
theorem Matrix.toLinearMapRight'_one :
Matrix.toLinearMapRight' (1 : Matrix m m R) = LinearMap.id := by
ext
simp [Module.End.one_apply]
/-- If `M` and `M'` are each other's inverse matrices, they provide an equivalence between `n → A`
and `m → A` corresponding to `M.vecMul` and `M'.vecMul`. -/
@[simps]
def Matrix.toLinearEquivRight'OfInv [Fintype n] [DecidableEq n] {M : Matrix m n R}
{M' : Matrix n m R} (hMM' : M * M' = 1) (hM'M : M' * M = 1) : (n → R) ≃ₗ[R] m → R :=
{ LinearMap.toMatrixRight'.symm M' with
toFun := Matrix.toLinearMapRight' M'
invFun := Matrix.toLinearMapRight' M
left_inv := fun x ↦ by
rw [← Matrix.toLinearMapRight'_mul_apply, hM'M, Matrix.toLinearMapRight'_one, id_apply]
right_inv := fun x ↦ by
rw [← Matrix.toLinearMapRight'_mul_apply, hMM', Matrix.toLinearMapRight'_one, id_apply] }
end
end ToMatrixRight
/-!
From this point on, we only work with commutative rings,
and fail to distinguish between `Rᵐᵒᵖ` and `R`.
This should eventually be remedied.
-/
section mulVec
variable {R : Type*} [CommSemiring R]
variable {k l m n : Type*}
/-- `Matrix.mulVec M` is a linear map. -/
def Matrix.mulVecLin [Fintype n] (M : Matrix m n R) : (n → R) →ₗ[R] m → R where
toFun := M.mulVec
map_add' _ _ := funext fun _ ↦ dotProduct_add _ _ _
map_smul' _ _ := funext fun _ ↦ dotProduct_smul _ _ _
theorem Matrix.coe_mulVecLin [Fintype n] (M : Matrix m n R) :
(M.mulVecLin : _ → _) = M.mulVec := rfl
@[simp]
theorem Matrix.mulVecLin_apply [Fintype n] (M : Matrix m n R) (v : n → R) :
M.mulVecLin v = M *ᵥ v :=
rfl
@[simp]
theorem Matrix.mulVecLin_zero [Fintype n] : Matrix.mulVecLin (0 : Matrix m n R) = 0 :=
LinearMap.ext zero_mulVec
@[simp]
theorem Matrix.mulVecLin_add [Fintype n] (M N : Matrix m n R) :
(M + N).mulVecLin = M.mulVecLin + N.mulVecLin :=
LinearMap.ext fun _ ↦ add_mulVec _ _ _
@[simp] theorem Matrix.mulVecLin_transpose [Fintype m] (M : Matrix m n R) :
Mᵀ.mulVecLin = M.vecMulLinear := by
ext; simp [mulVec_transpose]
@[simp] theorem Matrix.vecMulLinear_transpose [Fintype n] (M : Matrix m n R) :
Mᵀ.vecMulLinear = M.mulVecLin := by
ext; simp [vecMul_transpose]
theorem Matrix.mulVecLin_submatrix [Fintype n] [Fintype l] (f₁ : m → k) (e₂ : n ≃ l)
(M : Matrix k l R) :
(M.submatrix f₁ e₂).mulVecLin = funLeft R R f₁ ∘ₗ M.mulVecLin ∘ₗ funLeft _ _ e₂.symm :=
LinearMap.ext fun _ ↦ submatrix_mulVec_equiv _ _ _ _
/-- A variant of `Matrix.mulVecLin_submatrix` that keeps around `LinearEquiv`s. -/
theorem Matrix.mulVecLin_reindex [Fintype n] [Fintype l] (e₁ : k ≃ m) (e₂ : l ≃ n)
(M : Matrix k l R) :
(reindex e₁ e₂ M).mulVecLin =
↑(LinearEquiv.funCongrLeft R R e₁.symm) ∘ₗ
M.mulVecLin ∘ₗ ↑(LinearEquiv.funCongrLeft R R e₂) :=
Matrix.mulVecLin_submatrix _ _ _
variable [Fintype n]
@[simp]
theorem Matrix.mulVecLin_one [DecidableEq n] :
Matrix.mulVecLin (1 : Matrix n n R) = LinearMap.id := by
ext; simp [Matrix.one_apply, Pi.single_apply, eq_comm]
@[simp]
theorem Matrix.mulVecLin_mul [Fintype m] (M : Matrix l m R) (N : Matrix m n R) :
Matrix.mulVecLin (M * N) = (Matrix.mulVecLin M).comp (Matrix.mulVecLin N) :=
LinearMap.ext fun _ ↦ (mulVec_mulVec _ _ _).symm
theorem Matrix.ker_mulVecLin_eq_bot_iff {M : Matrix m n R} :
(LinearMap.ker M.mulVecLin) = ⊥ ↔ ∀ v, M *ᵥ v = 0 → v = 0 := by
simp only [Submodule.eq_bot_iff, LinearMap.mem_ker, Matrix.mulVecLin_apply]
theorem Matrix.range_mulVecLin (M : Matrix m n R) :
LinearMap.range M.mulVecLin = span R (range M.col) := by
rw [← vecMulLinear_transpose, range_vecMulLinear, row_transpose]
theorem Matrix.mulVec_injective_iff {R : Type*} [CommRing R] {M : Matrix m n R} :
Function.Injective M.mulVec ↔ LinearIndependent R M.col := by
change Function.Injective (fun x ↦ _) ↔ _
simp_rw [← M.vecMul_transpose, vecMul_injective_iff, row_transpose]
lemma Matrix.linearIndependent_cols_of_isUnit {R : Type*} [CommRing R] [Fintype m]
{A : Matrix m m R} [DecidableEq m] (ha : IsUnit A) :
LinearIndependent R A.col := by
rw [← Matrix.mulVec_injective_iff]
exact Matrix.mulVec_injective_of_isUnit ha
end mulVec
section ToMatrix'
variable {R : Type*} [CommSemiring R]
variable {k l m n : Type*} [DecidableEq n] [Fintype n]
/-- Linear maps `(n → R) →ₗ[R] (m → R)` are linearly equivalent to `Matrix m n R`. -/
def LinearMap.toMatrix' : ((n → R) →ₗ[R] m → R) ≃ₗ[R] Matrix m n R where
toFun f := of fun i j ↦ f (Pi.single j 1) i
invFun := Matrix.mulVecLin
right_inv M := by
ext i j
simp only [Matrix.mulVec_single_one, Matrix.mulVecLin_apply, of_apply, transpose_apply]
left_inv f := by
apply (Pi.basisFun R n).ext
intro j; ext i
simp only [Pi.basisFun_apply, Matrix.mulVec_single_one,
Matrix.mulVecLin_apply, of_apply, transpose_apply]
map_add' f g := by
ext i j
simp only [Pi.add_apply, LinearMap.add_apply, of_apply, Matrix.add_apply]
map_smul' c f := by
ext i j
simp only [Pi.smul_apply, LinearMap.smul_apply, RingHom.id_apply, of_apply, Matrix.smul_apply]
/-- A `Matrix m n R` is linearly equivalent to a linear map `(n → R) →ₗ[R] (m → R)`.
Note that the forward-direction does not require `DecidableEq` and is `Matrix.vecMulLin`. -/
def Matrix.toLin' : Matrix m n R ≃ₗ[R] (n → R) →ₗ[R] m → R :=
LinearMap.toMatrix'.symm
theorem Matrix.toLin'_apply' (M : Matrix m n R) : Matrix.toLin' M = M.mulVecLin :=
rfl
@[simp]
theorem LinearMap.toMatrix'_symm :
(LinearMap.toMatrix'.symm : Matrix m n R ≃ₗ[R] _) = Matrix.toLin' :=
rfl
@[simp]
theorem Matrix.toLin'_symm :
(Matrix.toLin'.symm : ((n → R) →ₗ[R] m → R) ≃ₗ[R] _) = LinearMap.toMatrix' :=
rfl
@[simp]
theorem LinearMap.toMatrix'_toLin' (M : Matrix m n R) : LinearMap.toMatrix' (Matrix.toLin' M) = M :=
LinearMap.toMatrix'.apply_symm_apply M
@[simp]
theorem Matrix.toLin'_toMatrix' (f : (n → R) →ₗ[R] m → R) :
Matrix.toLin' (LinearMap.toMatrix' f) = f :=
Matrix.toLin'.apply_symm_apply f
@[simp]
theorem LinearMap.toMatrix'_apply (f : (n → R) →ₗ[R] m → R) (i j) :
LinearMap.toMatrix' f i j = f (fun j' ↦ if j' = j then 1 else 0) i := by
simp only [LinearMap.toMatrix', LinearEquiv.coe_mk, of_apply]
congr! with i
split_ifs with h
· rw [h, Pi.single_eq_same]
apply Pi.single_eq_of_ne h
@[simp]
theorem Matrix.toLin'_apply (M : Matrix m n R) (v : n → R) : Matrix.toLin' M v = M *ᵥ v :=
rfl
@[simp]
theorem Matrix.toLin'_one : Matrix.toLin' (1 : Matrix n n R) = LinearMap.id :=
Matrix.mulVecLin_one
@[simp]
theorem LinearMap.toMatrix'_id : LinearMap.toMatrix' (LinearMap.id : (n → R) →ₗ[R] n → R) = 1 := by
ext
rw [Matrix.one_apply, LinearMap.toMatrix'_apply, id_apply]
@[simp]
theorem LinearMap.toMatrix'_one : LinearMap.toMatrix' (1 : (n → R) →ₗ[R] n → R) = 1 :=
LinearMap.toMatrix'_id
@[simp]
theorem Matrix.toLin'_mul [Fintype m] [DecidableEq m] (M : Matrix l m R) (N : Matrix m n R) :
Matrix.toLin' (M * N) = (Matrix.toLin' M).comp (Matrix.toLin' N) :=
Matrix.mulVecLin_mul _ _
@[simp]
theorem Matrix.toLin'_submatrix [Fintype l] [DecidableEq l] (f₁ : m → k) (e₂ : n ≃ l)
(M : Matrix k l R) :
Matrix.toLin' (M.submatrix f₁ e₂) =
funLeft R R f₁ ∘ₗ (Matrix.toLin' M) ∘ₗ funLeft _ _ e₂.symm :=
Matrix.mulVecLin_submatrix _ _ _
/-- A variant of `Matrix.toLin'_submatrix` that keeps around `LinearEquiv`s. -/
theorem Matrix.toLin'_reindex [Fintype l] [DecidableEq l] (e₁ : k ≃ m) (e₂ : l ≃ n)
(M : Matrix k l R) :
Matrix.toLin' (reindex e₁ e₂ M) =
↑(LinearEquiv.funCongrLeft R R e₁.symm) ∘ₗ (Matrix.toLin' M) ∘ₗ
↑(LinearEquiv.funCongrLeft R R e₂) :=
Matrix.mulVecLin_reindex _ _ _
/-- Shortcut lemma for `Matrix.toLin'_mul` and `LinearMap.comp_apply` -/
theorem Matrix.toLin'_mul_apply [Fintype m] [DecidableEq m] (M : Matrix l m R) (N : Matrix m n R)
(x) : Matrix.toLin' (M * N) x = Matrix.toLin' M (Matrix.toLin' N x) := by
rw [Matrix.toLin'_mul, LinearMap.comp_apply]
theorem LinearMap.toMatrix'_comp [Fintype l] [DecidableEq l] (f : (n → R) →ₗ[R] m → R)
(g : (l → R) →ₗ[R] n → R) :
LinearMap.toMatrix' (f.comp g) = LinearMap.toMatrix' f * LinearMap.toMatrix' g := by
suffices f.comp g = Matrix.toLin' (LinearMap.toMatrix' f * LinearMap.toMatrix' g) by
rw [this, LinearMap.toMatrix'_toLin']
rw [Matrix.toLin'_mul, Matrix.toLin'_toMatrix', Matrix.toLin'_toMatrix']
theorem LinearMap.toMatrix'_mul [Fintype m] [DecidableEq m] (f g : (m → R) →ₗ[R] m → R) :
LinearMap.toMatrix' (f * g) = LinearMap.toMatrix' f * LinearMap.toMatrix' g :=
LinearMap.toMatrix'_comp f g
@[simp]
theorem LinearMap.toMatrix'_algebraMap (x : R) :
LinearMap.toMatrix' (algebraMap R (Module.End R (n → R)) x) = scalar n x := by
simp [Module.algebraMap_end_eq_smul_id, smul_eq_diagonal_mul]
theorem Matrix.ker_toLin'_eq_bot_iff {M : Matrix n n R} :
LinearMap.ker (Matrix.toLin' M) = ⊥ ↔ ∀ v, M *ᵥ v = 0 → v = 0 :=
Matrix.ker_mulVecLin_eq_bot_iff
theorem Matrix.range_toLin' (M : Matrix m n R) :
LinearMap.range (Matrix.toLin' M) = span R (range M.col) :=
Matrix.range_mulVecLin _
/-- If `M` and `M'` are each other's inverse matrices, they provide an equivalence between `m → A`
and `n → A` corresponding to `M.mulVec` and `M'.mulVec`. -/
@[simps]
def Matrix.toLin'OfInv [Fintype m] [DecidableEq m] {M : Matrix m n R} {M' : Matrix n m R}
(hMM' : M * M' = 1) (hM'M : M' * M = 1) : (m → R) ≃ₗ[R] n → R :=
{ Matrix.toLin' M' with
toFun := Matrix.toLin' M'
invFun := Matrix.toLin' M
left_inv := fun x ↦ by rw [← Matrix.toLin'_mul_apply, hMM', Matrix.toLin'_one, id_apply]
right_inv := fun x ↦ by
rw [← Matrix.toLin'_mul_apply, hM'M, Matrix.toLin'_one, id_apply] }
/-- Linear maps `(n → R) →ₗ[R] (n → R)` are algebra equivalent to `Matrix n n R`. -/
def LinearMap.toMatrixAlgEquiv' : ((n → R) →ₗ[R] n → R) ≃ₐ[R] Matrix n n R :=
AlgEquiv.ofLinearEquiv LinearMap.toMatrix' LinearMap.toMatrix'_one LinearMap.toMatrix'_mul
/-- A `Matrix n n R` is algebra equivalent to a linear map `(n → R) →ₗ[R] (n → R)`. -/
def Matrix.toLinAlgEquiv' : Matrix n n R ≃ₐ[R] (n → R) →ₗ[R] n → R :=
LinearMap.toMatrixAlgEquiv'.symm
@[simp]
theorem LinearMap.toMatrixAlgEquiv'_symm :
(LinearMap.toMatrixAlgEquiv'.symm : Matrix n n R ≃ₐ[R] _) = Matrix.toLinAlgEquiv' :=
rfl
@[simp]
theorem Matrix.toLinAlgEquiv'_symm :
(Matrix.toLinAlgEquiv'.symm : ((n → R) →ₗ[R] n → R) ≃ₐ[R] _) = LinearMap.toMatrixAlgEquiv' :=
rfl
@[simp]
theorem LinearMap.toMatrixAlgEquiv'_toLinAlgEquiv' (M : Matrix n n R) :
LinearMap.toMatrixAlgEquiv' (Matrix.toLinAlgEquiv' M) = M :=
LinearMap.toMatrixAlgEquiv'.apply_symm_apply M
@[simp]
theorem Matrix.toLinAlgEquiv'_toMatrixAlgEquiv' (f : (n → R) →ₗ[R] n → R) :
Matrix.toLinAlgEquiv' (LinearMap.toMatrixAlgEquiv' f) = f :=
Matrix.toLinAlgEquiv'.apply_symm_apply f
@[simp]
theorem LinearMap.toMatrixAlgEquiv'_apply (f : (n → R) →ₗ[R] n → R) (i j) :
LinearMap.toMatrixAlgEquiv' f i j = f (fun j' ↦ if j' = j then 1 else 0) i := by
simp [LinearMap.toMatrixAlgEquiv']
@[simp]
theorem Matrix.toLinAlgEquiv'_apply (M : Matrix n n R) (v : n → R) :
Matrix.toLinAlgEquiv' M v = M *ᵥ v :=
rfl
theorem Matrix.toLinAlgEquiv'_one : Matrix.toLinAlgEquiv' (1 : Matrix n n R) = LinearMap.id :=
Matrix.toLin'_one
@[simp]
theorem LinearMap.toMatrixAlgEquiv'_id :
LinearMap.toMatrixAlgEquiv' (LinearMap.id : (n → R) →ₗ[R] n → R) = 1 :=
LinearMap.toMatrix'_id
theorem LinearMap.toMatrixAlgEquiv'_comp (f g : (n → R) →ₗ[R] n → R) :
LinearMap.toMatrixAlgEquiv' (f.comp g) =
LinearMap.toMatrixAlgEquiv' f * LinearMap.toMatrixAlgEquiv' g :=
LinearMap.toMatrix'_comp _ _
theorem LinearMap.toMatrixAlgEquiv'_mul (f g : (n → R) →ₗ[R] n → R) :
LinearMap.toMatrixAlgEquiv' (f * g) =
LinearMap.toMatrixAlgEquiv' f * LinearMap.toMatrixAlgEquiv' g :=
LinearMap.toMatrixAlgEquiv'_comp f g
end ToMatrix'
section ToMatrix
section Finite
variable {R : Type*} [CommSemiring R]
variable {l m n : Type*} [Fintype n] [Finite m] [DecidableEq n]
variable {M₁ M₂ : Type*} [AddCommMonoid M₁] [AddCommMonoid M₂] [Module R M₁] [Module R M₂]
variable (v₁ : Basis n R M₁) (v₂ : Basis m R M₂)
/-- Given bases of two modules `M₁` and `M₂` over a commutative ring `R`, we get a linear
equivalence between linear maps `M₁ →ₗ M₂` and matrices over `R` indexed by the bases. -/
def LinearMap.toMatrix : (M₁ →ₗ[R] M₂) ≃ₗ[R] Matrix m n R :=
LinearEquiv.trans (LinearEquiv.arrowCongr v₁.equivFun v₂.equivFun) LinearMap.toMatrix'
/-- `LinearMap.toMatrix'` is a particular case of `LinearMap.toMatrix`, for the standard basis
`Pi.basisFun R n`. -/
theorem LinearMap.toMatrix_eq_toMatrix' :
LinearMap.toMatrix (Pi.basisFun R n) (Pi.basisFun R n) = LinearMap.toMatrix' :=
rfl
/-- Given bases of two modules `M₁` and `M₂` over a commutative ring `R`, we get a linear
equivalence between matrices over `R` indexed by the bases and linear maps `M₁ →ₗ M₂`. -/
def Matrix.toLin : Matrix m n R ≃ₗ[R] M₁ →ₗ[R] M₂ :=
(LinearMap.toMatrix v₁ v₂).symm
/-- `Matrix.toLin'` is a particular case of `Matrix.toLin`, for the standard basis
`Pi.basisFun R n`. -/
theorem Matrix.toLin_eq_toLin' : Matrix.toLin (Pi.basisFun R n) (Pi.basisFun R m) = Matrix.toLin' :=
rfl
@[simp]
theorem LinearMap.toMatrix_symm : (LinearMap.toMatrix v₁ v₂).symm = Matrix.toLin v₁ v₂ :=
rfl
@[simp]
theorem Matrix.toLin_symm : (Matrix.toLin v₁ v₂).symm = LinearMap.toMatrix v₁ v₂ :=
rfl
@[simp]
theorem Matrix.toLin_toMatrix (f : M₁ →ₗ[R] M₂) :
Matrix.toLin v₁ v₂ (LinearMap.toMatrix v₁ v₂ f) = f := by
rw [← Matrix.toLin_symm, LinearEquiv.apply_symm_apply]
@[simp]
theorem LinearMap.toMatrix_toLin (M : Matrix m n R) :
LinearMap.toMatrix v₁ v₂ (Matrix.toLin v₁ v₂ M) = M := by
rw [← Matrix.toLin_symm, LinearEquiv.symm_apply_apply]
theorem LinearMap.toMatrix_apply (f : M₁ →ₗ[R] M₂) (i : m) (j : n) :
LinearMap.toMatrix v₁ v₂ f i j = v₂.repr (f (v₁ j)) i := by
rw [LinearMap.toMatrix, LinearEquiv.trans_apply, LinearMap.toMatrix'_apply,
LinearEquiv.arrowCongr_apply, Basis.equivFun_symm_apply, Finset.sum_eq_single j, if_pos rfl,
one_smul, Basis.equivFun_apply]
· intro j' _ hj'
rw [if_neg hj', zero_smul]
· intro hj
have := Finset.mem_univ j
contradiction
theorem LinearMap.toMatrix_transpose_apply (f : M₁ →ₗ[R] M₂) (j : n) :
(LinearMap.toMatrix v₁ v₂ f)ᵀ j = v₂.repr (f (v₁ j)) :=
funext fun i ↦ f.toMatrix_apply _ _ i j
theorem LinearMap.toMatrix_apply' (f : M₁ →ₗ[R] M₂) (i : m) (j : n) :
LinearMap.toMatrix v₁ v₂ f i j = v₂.repr (f (v₁ j)) i :=
LinearMap.toMatrix_apply v₁ v₂ f i j
theorem LinearMap.toMatrix_transpose_apply' (f : M₁ →ₗ[R] M₂) (j : n) :
(LinearMap.toMatrix v₁ v₂ f)ᵀ j = v₂.repr (f (v₁ j)) :=
LinearMap.toMatrix_transpose_apply v₁ v₂ f j
/-- This will be a special case of `LinearMap.toMatrix_id_eq_basis_toMatrix`. -/
theorem LinearMap.toMatrix_id : LinearMap.toMatrix v₁ v₁ id = 1 := by
ext i j
simp [LinearMap.toMatrix_apply, Matrix.one_apply, Finsupp.single_apply, eq_comm]
@[simp]
theorem LinearMap.toMatrix_one : LinearMap.toMatrix v₁ v₁ 1 = 1 :=
LinearMap.toMatrix_id v₁
@[simp]
lemma LinearMap.toMatrix_singleton {ι : Type*} [Unique ι] (f : R →ₗ[R] R) (i j : ι) :
f.toMatrix (.singleton ι R) (.singleton ι R) i j = f 1 := by
simp [toMatrix, Subsingleton.elim j default]
@[simp]
theorem Matrix.toLin_one : Matrix.toLin v₁ v₁ 1 = LinearMap.id := by
rw [← LinearMap.toMatrix_id v₁, Matrix.toLin_toMatrix]
theorem LinearMap.toMatrix_reindexRange [DecidableEq M₁] (f : M₁ →ₗ[R] M₂) (k : m) (i : n) :
LinearMap.toMatrix v₁.reindexRange v₂.reindexRange f ⟨v₂ k, Set.mem_range_self k⟩
⟨v₁ i, Set.mem_range_self i⟩ =
LinearMap.toMatrix v₁ v₂ f k i := by
simp_rw [LinearMap.toMatrix_apply, Basis.reindexRange_self, Basis.reindexRange_repr]
@[simp]
theorem LinearMap.toMatrix_algebraMap (x : R) :
LinearMap.toMatrix v₁ v₁ (algebraMap R (Module.End R M₁) x) = scalar n x := by
simp [Module.algebraMap_end_eq_smul_id, LinearMap.toMatrix_id, smul_eq_diagonal_mul]
theorem LinearMap.toMatrix_mulVec_repr (f : M₁ →ₗ[R] M₂) (x : M₁) :
LinearMap.toMatrix v₁ v₂ f *ᵥ v₁.repr x = v₂.repr (f x) := by
ext i
rw [← Matrix.toLin'_apply, LinearMap.toMatrix, LinearEquiv.trans_apply, Matrix.toLin'_toMatrix',
LinearEquiv.arrowCongr_apply, v₂.equivFun_apply]
congr
exact v₁.equivFun.symm_apply_apply x
@[simp]
theorem LinearMap.toMatrix_basis_equiv [Fintype l] [DecidableEq l] (b : Basis l R M₁)
(b' : Basis l R M₂) :
LinearMap.toMatrix b' b (b'.equiv b (Equiv.refl l) : M₂ →ₗ[R] M₁) = 1 := by
ext i j
simp [LinearMap.toMatrix_apply, Matrix.one_apply, Finsupp.single_apply, eq_comm]
theorem LinearMap.toMatrix_smulBasis_left {G} [Group G] [DistribMulAction G M₁]
[SMulCommClass G R M₁] (g : G) (f : M₁ →ₗ[R] M₂) :
LinearMap.toMatrix (g • v₁) v₂ f =
LinearMap.toMatrix v₁ v₂ (f ∘ₗ DistribMulAction.toLinearMap _ _ g) := by
ext
rw [LinearMap.toMatrix_apply, LinearMap.toMatrix_apply]
dsimp
theorem LinearMap.toMatrix_smulBasis_right {G} [Group G] [DistribMulAction G M₂]
[SMulCommClass G R M₂] (g : G) (f : M₁ →ₗ[R] M₂) :
LinearMap.toMatrix v₁ (g • v₂) f =
LinearMap.toMatrix v₁ v₂ (DistribMulAction.toLinearMap _ _ g⁻¹ ∘ₗ f) := by
ext
rw [LinearMap.toMatrix_apply, LinearMap.toMatrix_apply]
dsimp
end Finite
variable {R : Type*} [CommSemiring R]
variable {l m n : Type*} [Fintype n] [Fintype m] [DecidableEq n]
variable {M₁ M₂ : Type*} [AddCommMonoid M₁] [AddCommMonoid M₂] [Module R M₁] [Module R M₂]
variable (v₁ : Basis n R M₁) (v₂ : Basis m R M₂)
theorem Matrix.toLin_apply (M : Matrix m n R) (v : M₁) :
Matrix.toLin v₁ v₂ M v = ∑ j, (M *ᵥ v₁.repr v) j • v₂ j :=
show v₂.equivFun.symm (Matrix.toLin' M (v₁.repr v)) = _ by
rw [Matrix.toLin'_apply, v₂.equivFun_symm_apply]
@[simp]
theorem Matrix.toLin_self (M : Matrix m n R) (i : n) :
Matrix.toLin v₁ v₂ M (v₁ i) = ∑ j, M j i • v₂ j := by
rw [Matrix.toLin_apply, Finset.sum_congr rfl fun j _hj ↦ ?_]
rw [Basis.repr_self, Matrix.mulVec, dotProduct, Finset.sum_eq_single i, Finsupp.single_eq_same,
mul_one]
· intro i' _ i'_ne
rw [Finsupp.single_eq_of_ne i'_ne.symm, mul_zero]
· intros
have := Finset.mem_univ i
contradiction
variable {M₃ : Type*} [AddCommMonoid M₃] [Module R M₃] (v₃ : Basis l R M₃)
theorem LinearMap.toMatrix_comp [Finite l] [DecidableEq m] (f : M₂ →ₗ[R] M₃) (g : M₁ →ₗ[R] M₂) :
LinearMap.toMatrix v₁ v₃ (f.comp g) =
LinearMap.toMatrix v₂ v₃ f * LinearMap.toMatrix v₁ v₂ g := by
simp_rw [LinearMap.toMatrix, LinearEquiv.trans_apply, LinearEquiv.arrowCongr_comp _ v₂.equivFun,
LinearMap.toMatrix'_comp]
theorem LinearMap.toMatrix_mul (f g : M₁ →ₗ[R] M₁) :
LinearMap.toMatrix v₁ v₁ (f * g) = LinearMap.toMatrix v₁ v₁ f * LinearMap.toMatrix v₁ v₁ g := by
rw [Module.End.mul_eq_comp, LinearMap.toMatrix_comp v₁ v₁ v₁ f g]
lemma LinearMap.toMatrix_pow (f : M₁ →ₗ[R] M₁) (k : ℕ) :
(toMatrix v₁ v₁ f) ^ k = toMatrix v₁ v₁ (f ^ k) := by
induction k with
| zero => simp
| succ k ih => rw [pow_succ, pow_succ, ih, ← toMatrix_mul]
theorem Matrix.toLin_mul [Finite l] [DecidableEq m] (A : Matrix l m R) (B : Matrix m n R) :
Matrix.toLin v₁ v₃ (A * B) = (Matrix.toLin v₂ v₃ A).comp (Matrix.toLin v₁ v₂ B) := by
apply (LinearMap.toMatrix v₁ v₃).injective
haveI : DecidableEq l := fun _ _ ↦ Classical.propDecidable _
rw [LinearMap.toMatrix_comp v₁ v₂ v₃]
repeat' rw [LinearMap.toMatrix_toLin]
/-- Shortcut lemma for `Matrix.toLin_mul` and `LinearMap.comp_apply`. -/
theorem Matrix.toLin_mul_apply [Finite l] [DecidableEq m] (A : Matrix l m R) (B : Matrix m n R)
(x) : Matrix.toLin v₁ v₃ (A * B) x = (Matrix.toLin v₂ v₃ A) (Matrix.toLin v₁ v₂ B x) := by
rw [Matrix.toLin_mul v₁ v₂, LinearMap.comp_apply]
/-- If `M` and `M` are each other's inverse matrices, `Matrix.toLin M` and `Matrix.toLin M'`
form a linear equivalence. -/
@[simps]
def Matrix.toLinOfInv [DecidableEq m] {M : Matrix m n R} {M' : Matrix n m R} (hMM' : M * M' = 1)
(hM'M : M' * M = 1) : M₁ ≃ₗ[R] M₂ :=
{ Matrix.toLin v₁ v₂ M with
toFun := Matrix.toLin v₁ v₂ M
invFun := Matrix.toLin v₂ v₁ M'
left_inv := fun x ↦ by rw [← Matrix.toLin_mul_apply, hM'M, Matrix.toLin_one, id_apply]
right_inv := fun x ↦ by
rw [← Matrix.toLin_mul_apply, hMM', Matrix.toLin_one, id_apply] }
/-- Given a basis of a module `M₁` over a commutative ring `R`, we get an algebra
equivalence between linear maps `M₁ →ₗ M₁` and square matrices over `R` indexed by the basis. -/
def LinearMap.toMatrixAlgEquiv : (M₁ →ₗ[R] M₁) ≃ₐ[R] Matrix n n R :=
AlgEquiv.ofLinearEquiv
(LinearMap.toMatrix v₁ v₁) (LinearMap.toMatrix_one v₁) (LinearMap.toMatrix_mul v₁)
/-- Given a basis of a module `M₁` over a commutative ring `R`, we get an algebra
equivalence between square matrices over `R` indexed by the basis and linear maps `M₁ →ₗ M₁`. -/
def Matrix.toLinAlgEquiv : Matrix n n R ≃ₐ[R] M₁ →ₗ[R] M₁ :=
(LinearMap.toMatrixAlgEquiv v₁).symm
@[simp]
theorem LinearMap.toMatrixAlgEquiv_symm :
(LinearMap.toMatrixAlgEquiv v₁).symm = Matrix.toLinAlgEquiv v₁ :=
rfl
@[simp]
theorem Matrix.toLinAlgEquiv_symm :
(Matrix.toLinAlgEquiv v₁).symm = LinearMap.toMatrixAlgEquiv v₁ :=
rfl
@[simp]
theorem Matrix.toLinAlgEquiv_toMatrixAlgEquiv (f : M₁ →ₗ[R] M₁) :
Matrix.toLinAlgEquiv v₁ (LinearMap.toMatrixAlgEquiv v₁ f) = f := by
rw [← Matrix.toLinAlgEquiv_symm, AlgEquiv.apply_symm_apply]
@[simp]
theorem LinearMap.toMatrixAlgEquiv_toLinAlgEquiv (M : Matrix n n R) :
LinearMap.toMatrixAlgEquiv v₁ (Matrix.toLinAlgEquiv v₁ M) = M := by
rw [← Matrix.toLinAlgEquiv_symm, AlgEquiv.symm_apply_apply]
theorem LinearMap.toMatrixAlgEquiv_apply (f : M₁ →ₗ[R] M₁) (i j : n) :
LinearMap.toMatrixAlgEquiv v₁ f i j = v₁.repr (f (v₁ j)) i := by
simp [LinearMap.toMatrixAlgEquiv, LinearMap.toMatrix_apply]
theorem LinearMap.toMatrixAlgEquiv_transpose_apply (f : M₁ →ₗ[R] M₁) (j : n) :
(LinearMap.toMatrixAlgEquiv v₁ f)ᵀ j = v₁.repr (f (v₁ j)) :=
funext fun i ↦ f.toMatrix_apply _ _ i j
theorem LinearMap.toMatrixAlgEquiv_apply' (f : M₁ →ₗ[R] M₁) (i j : n) :
LinearMap.toMatrixAlgEquiv v₁ f i j = v₁.repr (f (v₁ j)) i :=
LinearMap.toMatrixAlgEquiv_apply v₁ f i j
theorem LinearMap.toMatrixAlgEquiv_transpose_apply' (f : M₁ →ₗ[R] M₁) (j : n) :
(LinearMap.toMatrixAlgEquiv v₁ f)ᵀ j = v₁.repr (f (v₁ j)) :=
LinearMap.toMatrixAlgEquiv_transpose_apply v₁ f j
theorem Matrix.toLinAlgEquiv_apply (M : Matrix n n R) (v : M₁) :
Matrix.toLinAlgEquiv v₁ M v = ∑ j, (M *ᵥ v₁.repr v) j • v₁ j :=
show v₁.equivFun.symm (Matrix.toLinAlgEquiv' M (v₁.repr v)) = _ by
rw [Matrix.toLinAlgEquiv'_apply, v₁.equivFun_symm_apply]
@[simp]
theorem Matrix.toLinAlgEquiv_self (M : Matrix n n R) (i : n) :
Matrix.toLinAlgEquiv v₁ M (v₁ i) = ∑ j, M j i • v₁ j :=
Matrix.toLin_self _ _ _ _
theorem LinearMap.toMatrixAlgEquiv_id : LinearMap.toMatrixAlgEquiv v₁ id = 1 := by
simp_rw [LinearMap.toMatrixAlgEquiv, AlgEquiv.ofLinearEquiv_apply, LinearMap.toMatrix_id]
theorem Matrix.toLinAlgEquiv_one : Matrix.toLinAlgEquiv v₁ 1 = LinearMap.id := by
rw [← LinearMap.toMatrixAlgEquiv_id v₁, Matrix.toLinAlgEquiv_toMatrixAlgEquiv]
theorem LinearMap.toMatrixAlgEquiv_reindexRange [DecidableEq M₁] (f : M₁ →ₗ[R] M₁) (k i : n) :
LinearMap.toMatrixAlgEquiv v₁.reindexRange f
⟨v₁ k, Set.mem_range_self k⟩ ⟨v₁ i, Set.mem_range_self i⟩ =
LinearMap.toMatrixAlgEquiv v₁ f k i := by
simp_rw [LinearMap.toMatrixAlgEquiv_apply, Basis.reindexRange_self, Basis.reindexRange_repr]
theorem LinearMap.toMatrixAlgEquiv_comp (f g : M₁ →ₗ[R] M₁) :
LinearMap.toMatrixAlgEquiv v₁ (f.comp g) =
LinearMap.toMatrixAlgEquiv v₁ f * LinearMap.toMatrixAlgEquiv v₁ g := by
simp [LinearMap.toMatrixAlgEquiv, LinearMap.toMatrix_comp v₁ v₁ v₁ f g]
theorem LinearMap.toMatrixAlgEquiv_mul (f g : M₁ →ₗ[R] M₁) :
LinearMap.toMatrixAlgEquiv v₁ (f * g) =
LinearMap.toMatrixAlgEquiv v₁ f * LinearMap.toMatrixAlgEquiv v₁ g := by
rw [Module.End.mul_eq_comp, LinearMap.toMatrixAlgEquiv_comp v₁ f g]
theorem Matrix.toLinAlgEquiv_mul (A B : Matrix n n R) :
Matrix.toLinAlgEquiv v₁ (A * B) =
(Matrix.toLinAlgEquiv v₁ A).comp (Matrix.toLinAlgEquiv v₁ B) := by
convert Matrix.toLin_mul v₁ v₁ v₁ A B
@[simp]
theorem Matrix.toLin_finTwoProd_apply (a b c d : R) (x : R × R) :
Matrix.toLin (Basis.finTwoProd R) (Basis.finTwoProd R) !![a, b; c, d] x =
(a * x.fst + b * x.snd, c * x.fst + d * x.snd) := by
simp [Matrix.toLin_apply, Matrix.mulVec, dotProduct]
theorem Matrix.toLin_finTwoProd (a b c d : R) :
Matrix.toLin (Basis.finTwoProd R) (Basis.finTwoProd R) !![a, b; c, d] =
(a • LinearMap.fst R R R + b • LinearMap.snd R R R).prod
(c • LinearMap.fst R R R + d • LinearMap.snd R R R) :=
LinearMap.ext <| Matrix.toLin_finTwoProd_apply _ _ _ _
@[simp]
theorem toMatrix_distrib_mul_action_toLinearMap (x : R) :
LinearMap.toMatrix v₁ v₁ (DistribMulAction.toLinearMap R M₁ x) =
Matrix.diagonal fun _ ↦ x := by
ext
rw [LinearMap.toMatrix_apply, DistribMulAction.toLinearMap_apply, LinearEquiv.map_smul,
Basis.repr_self, Finsupp.smul_single_one, Finsupp.single_eq_pi_single, Matrix.diagonal_apply,
Pi.single_apply]
lemma LinearMap.toMatrix_prodMap [DecidableEq m] [DecidableEq (n ⊕ m)]
(φ₁ : Module.End R M₁) (φ₂ : Module.End R M₂) :
toMatrix (v₁.prod v₂) (v₁.prod v₂) (φ₁.prodMap φ₂) =
Matrix.fromBlocks (toMatrix v₁ v₁ φ₁) 0 0 (toMatrix v₂ v₂ φ₂) := by
ext (i|i) (j|j) <;> simp [toMatrix]
end ToMatrix
namespace Algebra
section Lmul
variable {R S : Type*} [CommSemiring R] [Semiring S] [Algebra R S]
variable {m : Type*} [Fintype m] [DecidableEq m] (b : Basis m R S)
theorem toMatrix_lmul' (x : S) (i j) :
LinearMap.toMatrix b b (lmul R S x) i j = b.repr (x * b j) i := by
simp only [LinearMap.toMatrix_apply', coe_lmul_eq_mul, LinearMap.mul_apply']
@[simp]
theorem toMatrix_lsmul (x : R) :
LinearMap.toMatrix b b (Algebra.lsmul R R S x) = Matrix.diagonal fun _ ↦ x :=
toMatrix_distrib_mul_action_toLinearMap b x
/-- `leftMulMatrix b x` is the matrix corresponding to the linear map `fun y ↦ x * y`.
`leftMulMatrix_eq_repr_mul` gives a formula for the entries of `leftMulMatrix`.
This definition is useful for doing (more) explicit computations with `LinearMap.mulLeft`,
such as the trace form or norm map for algebras.
-/
noncomputable def leftMulMatrix : S →ₐ[R] Matrix m m R where
toFun x := LinearMap.toMatrix b b (Algebra.lmul R S x)
map_zero' := by
rw [map_zero, LinearEquiv.map_zero]
map_one' := by
rw [map_one, LinearMap.toMatrix_one]
map_add' x y := by
rw [map_add, LinearEquiv.map_add]
map_mul' x y := by
rw [map_mul, LinearMap.toMatrix_mul]
commutes' r := by
ext
rw [lmul_algebraMap, toMatrix_lsmul, algebraMap_eq_diagonal, Pi.algebraMap_def,
Algebra.id.map_eq_self]
theorem leftMulMatrix_apply (x : S) : leftMulMatrix b x = LinearMap.toMatrix b b (lmul R S x) :=
rfl
theorem leftMulMatrix_eq_repr_mul (x : S) (i j) : leftMulMatrix b x i j = b.repr (x * b j) i := by
-- This is defeq to just `toMatrix_lmul' b x i j`,
-- but the unfolding goes a lot faster with this explicit `rw`.
rw [leftMulMatrix_apply, toMatrix_lmul' b x i j]
theorem leftMulMatrix_mulVec_repr (x y : S) :
leftMulMatrix b x *ᵥ b.repr y = b.repr (x * y) :=
(LinearMap.mulLeft R x).toMatrix_mulVec_repr b b y
@[simp]
theorem toMatrix_lmul_eq (x : S) :
LinearMap.toMatrix b b (LinearMap.mulLeft R x) = leftMulMatrix b x :=
rfl
theorem leftMulMatrix_injective : Function.Injective (leftMulMatrix b) := fun x x' h ↦
calc
x = Algebra.lmul R S x 1 := (mul_one x).symm
_ = Algebra.lmul R S x' 1 := by rw [(LinearMap.toMatrix b b).injective h]
_ = x' := mul_one x'
@[simp]
theorem smul_leftMulMatrix {G} [Group G] [DistribMulAction G S]
[SMulCommClass G R S] [SMulCommClass G S S] (g : G) (x) :
leftMulMatrix (g • b) x = leftMulMatrix b x := by
ext
simp_rw [leftMulMatrix_apply, LinearMap.toMatrix_apply, coe_lmul_eq_mul, LinearMap.mul_apply',
Basis.repr_smul, Basis.smul_apply, LinearEquiv.trans_apply,
DistribMulAction.toLinearEquiv_symm_apply, mul_smul_comm, inv_smul_smul]
variable {A M n : Type*} [Fintype n] [DecidableEq n]
[CommSemiring A] [AddCommMonoid M] [Module R M] [Module A M] [Algebra R A] [IsScalarTower R A M]
(bA : Basis m R A) (bM : Basis n A M)
lemma _root_.LinearMap.restrictScalars_toMatrix (f : M →ₗ[A] M) :
(f.restrictScalars R).toMatrix (bA.smulTower' bM) (bA.smulTower' bM) =
((f.toMatrix bM bM).map (leftMulMatrix bA)).comp _ _ _ _ _ := by
| ext; simp [toMatrix, Basis.repr, Algebra.leftMulMatrix_apply,
Basis.smulTower'_repr, Basis.smulTower'_apply, mul_comm]
end Lmul
section LmulTower
| Mathlib/LinearAlgebra/Matrix/ToLin.lean | 860 | 866 |
/-
Copyright (c) 2017 Johannes Hölzl. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johannes Hölzl, Mario Carneiro, Kevin Buzzard, Yury Kudryashov, Eric Wieser
-/
import Mathlib.Algebra.Group.Fin.Tuple
import Mathlib.Algebra.BigOperators.GroupWithZero.Action
import Mathlib.Algebra.BigOperators.Pi
import Mathlib.Algebra.Module.Prod
import Mathlib.Algebra.Module.Submodule.Ker
import Mathlib.Algebra.Module.Submodule.Range
import Mathlib.Algebra.Module.Equiv.Basic
import Mathlib.Logic.Equiv.Fin.Basic
import Mathlib.LinearAlgebra.Prod
import Mathlib.Data.Fintype.Option
/-!
# Pi types of modules
This file defines constructors for linear maps whose domains or codomains are pi types.
It contains theorems relating these to each other, as well as to `LinearMap.ker`.
## Main definitions
- pi types in the codomain:
- `LinearMap.pi`
- `LinearMap.single`
- pi types in the domain:
- `LinearMap.proj`
- `LinearMap.diag`
-/
universe u v w x y z u' v' w' x' y'
variable {R : Type u} {K : Type u'} {M : Type v} {V : Type v'} {M₂ : Type w} {V₂ : Type w'}
variable {M₃ : Type y} {V₃ : Type y'} {M₄ : Type z} {ι : Type x} {ι' : Type x'}
open Function Submodule
namespace LinearMap
universe i
variable [Semiring R] [AddCommMonoid M₂] [Module R M₂] [AddCommMonoid M₃] [Module R M₃]
{φ : ι → Type i} [(i : ι) → AddCommMonoid (φ i)] [(i : ι) → Module R (φ i)]
/-- `pi` construction for linear functions. From a family of linear functions it produces a linear
function into a family of modules. -/
def pi (f : (i : ι) → M₂ →ₗ[R] φ i) : M₂ →ₗ[R] (i : ι) → φ i :=
{ Pi.addHom fun i => (f i).toAddHom with
toFun := fun c i => f i c
map_smul' := fun _ _ => funext fun i => (f i).map_smul _ _ }
@[simp]
theorem pi_apply (f : (i : ι) → M₂ →ₗ[R] φ i) (c : M₂) (i : ι) : pi f c i = f i c :=
rfl
theorem ker_pi (f : (i : ι) → M₂ →ₗ[R] φ i) : ker (pi f) = ⨅ i : ι, ker (f i) := by
ext c; simp [funext_iff]
theorem pi_eq_zero (f : (i : ι) → M₂ →ₗ[R] φ i) : pi f = 0 ↔ ∀ i, f i = 0 := by
simp only [LinearMap.ext_iff, pi_apply, funext_iff]
exact ⟨fun h a b => h b a, fun h a b => h b a⟩
theorem pi_zero : pi (fun _ => 0 : (i : ι) → M₂ →ₗ[R] φ i) = 0 := by ext; rfl
theorem pi_comp (f : (i : ι) → M₂ →ₗ[R] φ i) (g : M₃ →ₗ[R] M₂) :
(pi f).comp g = pi fun i => (f i).comp g :=
rfl
/-- The projections from a family of modules are linear maps.
Note: known here as `LinearMap.proj`, this construction is in other categories called `eval`, for
example `Pi.evalMonoidHom`, `Pi.evalRingHom`. -/
def proj (i : ι) : ((i : ι) → φ i) →ₗ[R] φ i where
toFun := Function.eval i
map_add' _ _ := rfl
map_smul' _ _ := rfl
@[simp]
theorem coe_proj (i : ι) : ⇑(proj i : ((i : ι) → φ i) →ₗ[R] φ i) = Function.eval i :=
rfl
theorem proj_apply (i : ι) (b : (i : ι) → φ i) : (proj i : ((i : ι) → φ i) →ₗ[R] φ i) b = b i :=
rfl
@[simp]
theorem proj_pi (f : (i : ι) → M₂ →ₗ[R] φ i) (i : ι) : (proj i).comp (pi f) = f i := rfl
@[simp]
theorem pi_proj : pi proj = LinearMap.id (R := R) (M := ∀ i, φ i) := rfl
@[simp]
theorem pi_proj_comp (f : M₂ →ₗ[R] ∀ i, φ i) : pi (proj · ∘ₗ f) = f := rfl
theorem proj_surjective (i : ι) : Surjective (proj i : ((i : ι) → φ i) →ₗ[R] φ i) :=
surjective_eval i
theorem iInf_ker_proj : (⨅ i, ker (proj i : ((i : ι) → φ i) →ₗ[R] φ i) :
Submodule R ((i : ι) → φ i)) = ⊥ :=
bot_unique <|
SetLike.le_def.2 fun a h => by
simp only [mem_iInf, mem_ker, proj_apply] at h
exact (mem_bot _).2 (funext fun i => h i)
instance CompatibleSMul.pi (R S M N ι : Type*) [Semiring S]
[AddCommMonoid M] [AddCommMonoid N] [SMul R M] [SMul R N] [Module S M] [Module S N]
[LinearMap.CompatibleSMul M N R S] : LinearMap.CompatibleSMul M (ι → N) R S where
map_smul f r m := by ext i; apply ((LinearMap.proj i).comp f).map_smul_of_tower
/-- Linear map between the function spaces `I → M₂` and `I → M₃`, induced by a linear map `f`
between `M₂` and `M₃`. -/
@[simps]
protected def compLeft (f : M₂ →ₗ[R] M₃) (I : Type*) : (I → M₂) →ₗ[R] I → M₃ :=
{ f.toAddMonoidHom.compLeft I with
toFun := fun h => f ∘ h
map_smul' := fun c h => by
ext x
exact f.map_smul' c (h x) }
theorem apply_single [AddCommMonoid M] [Module R M] [DecidableEq ι] (f : (i : ι) → φ i →ₗ[R] M)
(i j : ι) (x : φ i) : f j (Pi.single i x j) = (Pi.single i (f i x) : ι → M) j :=
Pi.apply_single (fun i => f i) (fun i => (f i).map_zero) _ _ _
variable (R φ)
/-- The `LinearMap` version of `AddMonoidHom.single` and `Pi.single`. -/
def single [DecidableEq ι] (i : ι) : φ i →ₗ[R] (i : ι) → φ i :=
{ AddMonoidHom.single φ i with
toFun := Pi.single i
map_smul' := Pi.single_smul i }
lemma single_apply [DecidableEq ι] {i : ι} (v : φ i) :
single R φ i v = Pi.single i v :=
rfl
@[simp]
theorem coe_single [DecidableEq ι] (i : ι) :
⇑(single R φ i : φ i →ₗ[R] (i : ι) → φ i) = Pi.single i :=
rfl
variable [DecidableEq ι]
theorem proj_comp_single_same (i : ι) : (proj i).comp (single R φ i) = id :=
LinearMap.ext <| Pi.single_eq_same i
theorem proj_comp_single_ne (i j : ι) (h : i ≠ j) : (proj i).comp (single R φ j) = 0 :=
LinearMap.ext <| Pi.single_eq_of_ne h
theorem iSup_range_single_le_iInf_ker_proj (I J : Set ι) (h : Disjoint I J) :
⨆ i ∈ I, range (single R φ i) ≤ ⨅ i ∈ J, ker (proj i : (∀ i, φ i) →ₗ[R] φ i) := by
refine iSup_le fun i => iSup_le fun hi => range_le_iff_comap.2 ?_
simp only [← ker_comp, eq_top_iff, SetLike.le_def, mem_ker, comap_iInf, mem_iInf]
rintro b - j hj
rw [proj_comp_single_ne R φ j i, zero_apply]
rintro rfl
exact h.le_bot ⟨hi, hj⟩
theorem iInf_ker_proj_le_iSup_range_single {I : Finset ι} {J : Set ι} (hu : Set.univ ⊆ ↑I ∪ J) :
⨅ i ∈ J, ker (proj i : (∀ i, φ i) →ₗ[R] φ i) ≤ ⨆ i ∈ I, range (single R φ i) :=
SetLike.le_def.2
(by
intro b hb
simp only [mem_iInf, mem_ker, proj_apply] at hb
rw [←
show (∑ i ∈ I, Pi.single i (b i)) = b by
ext i
rw [Finset.sum_apply, ← Pi.single_eq_same i (b i)]
refine Finset.sum_eq_single i (fun j _ ne => Pi.single_eq_of_ne ne.symm _) ?_
intro hiI
rw [Pi.single_eq_same]
exact hb _ ((hu trivial).resolve_left hiI)]
exact sum_mem_biSup fun i _ => mem_range_self (single R φ i) (b i))
theorem iSup_range_single_eq_iInf_ker_proj {I J : Set ι} (hd : Disjoint I J)
(hu : Set.univ ⊆ I ∪ J) (hI : Set.Finite I) :
⨆ i ∈ I, range (single R φ i) = ⨅ i ∈ J, ker (proj i : (∀ i, φ i) →ₗ[R] φ i) := by
refine le_antisymm (iSup_range_single_le_iInf_ker_proj _ _ _ _ hd) ?_
have : Set.univ ⊆ ↑hI.toFinset ∪ J := by rwa [hI.coe_toFinset]
refine le_trans (iInf_ker_proj_le_iSup_range_single R φ this) (iSup_mono fun i => ?_)
rw [Set.Finite.mem_toFinset]
theorem iSup_range_single [Finite ι] : ⨆ i, range (single R φ i) = ⊤ := by
cases nonempty_fintype ι
convert top_unique (iInf_emptyset.ge.trans <| iInf_ker_proj_le_iSup_range_single R φ _)
· rename_i i
exact ((@iSup_pos _ _ _ fun _ => range <| single R φ i) <| Finset.mem_univ i).symm
· rw [Finset.coe_univ, Set.union_empty]
theorem disjoint_single_single (I J : Set ι) (h : Disjoint I J) :
Disjoint (⨆ i ∈ I, range (single R φ i)) (⨆ i ∈ J, range (single R φ i)) := by
refine
Disjoint.mono (iSup_range_single_le_iInf_ker_proj _ _ _ _ <| disjoint_compl_right)
(iSup_range_single_le_iInf_ker_proj _ _ _ _ <| disjoint_compl_right) ?_
simp only [disjoint_iff_inf_le, SetLike.le_def, mem_iInf, mem_inf, mem_ker, mem_bot, proj_apply,
funext_iff]
rintro b ⟨hI, hJ⟩ i
classical
by_cases hiI : i ∈ I
· by_cases hiJ : i ∈ J
· exact (h.le_bot ⟨hiI, hiJ⟩).elim
· exact hJ i hiJ
· exact hI i hiI
/-- The linear equivalence between linear functions on a finite product of modules and
families of functions on these modules. See note [bundled maps over different rings]. -/
@[simps symm_apply]
def lsum (S) [AddCommMonoid M] [Module R M] [Fintype ι] [Semiring S] [Module S M]
[SMulCommClass R S M] : ((i : ι) → φ i →ₗ[R] M) ≃ₗ[S] ((i : ι) → φ i) →ₗ[R] M where
toFun f := ∑ i : ι, (f i).comp (proj i)
invFun f i := f.comp (single R φ i)
map_add' f g := by simp only [Pi.add_apply, add_comp, Finset.sum_add_distrib]
map_smul' c f := by simp only [Pi.smul_apply, smul_comp, Finset.smul_sum, RingHom.id_apply]
left_inv f := by
ext i x
simp [apply_single]
right_inv f := by
ext x
suffices f (∑ j, Pi.single j (x j)) = f x by simpa [apply_single]
rw [Finset.univ_sum_single]
@[simp]
theorem lsum_apply (S) [AddCommMonoid M] [Module R M] [Fintype ι] [Semiring S]
[Module S M] [SMulCommClass R S M] (f : (i : ι) → φ i →ₗ[R] M) :
lsum R φ S f = ∑ i : ι, (f i).comp (proj i) := rfl
theorem lsum_piSingle (S) [AddCommMonoid M] [Module R M] [Fintype ι] [Semiring S]
[Module S M] [SMulCommClass R S M] (f : (i : ι) → φ i →ₗ[R] M) (i : ι) (x : φ i) :
lsum R φ S f (Pi.single i x) = f i x := by
simp_rw [lsum_apply, sum_apply, comp_apply, proj_apply, apply_single, Fintype.sum_pi_single']
@[simp high]
theorem lsum_single {ι R : Type*} [Fintype ι] [DecidableEq ι] [CommSemiring R] {M : ι → Type*}
[(i : ι) → AddCommMonoid (M i)] [(i : ι) → Module R (M i)] :
LinearMap.lsum R M R (LinearMap.single R M) = LinearMap.id :=
LinearMap.ext fun x => by simp [Finset.univ_sum_single]
variable {R φ}
section Ext
variable [Finite ι] [AddCommMonoid M] [Module R M] {f g : ((i : ι) → φ i) →ₗ[R] M}
theorem pi_ext (h : ∀ i x, f (Pi.single i x) = g (Pi.single i x)) : f = g :=
toAddMonoidHom_injective <| AddMonoidHom.functions_ext _ _ _ h
theorem pi_ext_iff : f = g ↔ ∀ i x, f (Pi.single i x) = g (Pi.single i x) :=
⟨fun h _ _ => h ▸ rfl, pi_ext⟩
/-- This is used as the ext lemma instead of `LinearMap.pi_ext` for reasons explained in
note [partially-applied ext lemmas]. -/
@[ext]
theorem pi_ext' (h : ∀ i, f.comp (single R φ i) = g.comp (single R φ i)) : f = g := by
refine pi_ext fun i x => ?_
convert LinearMap.congr_fun (h i) x
end Ext
section
variable (R φ)
/-- If `I` and `J` are disjoint index sets, the product of the kernels of the `J`th projections of
`φ` is linearly equivalent to the product over `I`. -/
def iInfKerProjEquiv {I J : Set ι} [DecidablePred fun i => i ∈ I] (hd : Disjoint I J)
(hu : Set.univ ⊆ I ∪ J) :
(⨅ i ∈ J, ker (proj i : ((i : ι) → φ i) →ₗ[R] φ i) :
Submodule R ((i : ι) → φ i)) ≃ₗ[R] (i : I) → φ i := by
refine
LinearEquiv.ofLinear (pi fun i => (proj (i : ι)).comp (Submodule.subtype _))
(codRestrict _ (pi fun i => if h : i ∈ I then proj (⟨i, h⟩ : I) else 0) ?_) ?_ ?_
· intro b
simp only [mem_iInf, mem_ker, funext_iff, proj_apply, pi_apply]
intro j hjJ
have : j ∉ I := fun hjI => hd.le_bot ⟨hjI, hjJ⟩
rw [dif_neg this, zero_apply]
· simp only [pi_comp, comp_assoc, subtype_comp_codRestrict, proj_pi, Subtype.coe_prop]
ext b ⟨j, hj⟩
simp only [dif_pos, Function.comp_apply, Function.eval_apply, LinearMap.codRestrict_apply,
LinearMap.coe_comp, LinearMap.coe_proj, LinearMap.pi_apply, Submodule.subtype_apply,
Subtype.coe_prop]
rfl
· ext1 ⟨b, hb⟩
apply Subtype.ext
ext j
have hb : ∀ i ∈ J, b i = 0 := by
simpa only [mem_iInf, mem_ker, proj_apply] using (mem_iInf _).1 hb
simp only [comp_apply, pi_apply, id_apply, proj_apply, subtype_apply, codRestrict_apply]
split_ifs with h
· rfl
· exact (hb _ <| (hu trivial).resolve_left h).symm
end
section
/-- `diag i j` is the identity map if `i = j`. Otherwise it is the constant 0 map. -/
def diag (i j : ι) : φ i →ₗ[R] φ j :=
@Function.update ι (fun j => φ i →ₗ[R] φ j) _ 0 i id j
theorem update_apply (f : (i : ι) → M₂ →ₗ[R] φ i) (c : M₂) (i j : ι) (b : M₂ →ₗ[R] φ i) :
(update f i b j) c = update (fun i => f i c) i (b c) j := by
by_cases h : j = i
· rw [h, update_self, update_self]
· rw [update_of_ne h, update_of_ne h]
variable (R φ)
theorem single_eq_pi_diag (i : ι) : single R φ i = pi (diag i) := by
ext x j
convert (update_apply 0 x i j _).symm
rfl
theorem ker_single (i : ι) : ker (single R φ i) = ⊥ :=
ker_eq_bot_of_injective <| Pi.single_injective _ _
theorem proj_comp_single (i j : ι) : (proj i).comp (single R φ j) = diag j i := by
rw [single_eq_pi_diag, proj_pi]
| end
/-- A linear map `f` applied to `x : ι → R` can be computed using the image under `f` of elements
of the canonical basis. -/
theorem pi_apply_eq_sum_univ [Fintype ι] (f : (ι → R) →ₗ[R] M₂) (x : ι → R) :
f x = ∑ i, x i • f fun j => if i = j then 1 else 0 := by
conv_lhs => rw [pi_eq_sum_univ x, map_sum]
refine Finset.sum_congr rfl (fun _ _ => ?_)
rw [map_smul]
| Mathlib/LinearAlgebra/Pi.lean | 323 | 331 |
/-
Copyright (c) 2014 Jeremy Avigad. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Jeremy Avigad, Leonardo de Moura
-/
import Batteries.Data.Nat.Gcd
import Mathlib.Algebra.Group.Nat.Units
import Mathlib.Algebra.GroupWithZero.Divisibility
import Mathlib.Algebra.GroupWithZero.Nat
/-!
# Properties of `Nat.gcd`, `Nat.lcm`, and `Nat.Coprime`
Definitions are provided in batteries.
Generalizations of these are provided in a later file as `GCDMonoid.gcd` and
`GCDMonoid.lcm`.
Note that the global `IsCoprime` is not a straightforward generalization of `Nat.Coprime`, see
`Nat.isCoprime_iff_coprime` for the connection between the two.
Most of this file could be moved to batteries as well.
-/
assert_not_exists OrderedCommMonoid
namespace Nat
variable {a a₁ a₂ b b₁ b₂ c : ℕ}
/-! ### `gcd` -/
theorem gcd_greatest {a b d : ℕ} (hda : d ∣ a) (hdb : d ∣ b) (hd : ∀ e : ℕ, e ∣ a → e ∣ b → e ∣ d) :
d = a.gcd b :=
(dvd_antisymm (hd _ (gcd_dvd_left a b) (gcd_dvd_right a b)) (dvd_gcd hda hdb)).symm
/-! Lemmas where one argument consists of addition of a multiple of the other -/
@[simp]
theorem pow_sub_one_mod_pow_sub_one (a b c : ℕ) : (a ^ c - 1) % (a ^ b - 1) = a ^ (c % b) - 1 := by
rcases eq_zero_or_pos a with rfl | ha0
· simp [zero_pow_eq]; split_ifs <;> simp
rcases Nat.eq_or_lt_of_le ha0 with rfl | ha1
· simp
rcases eq_zero_or_pos b with rfl | hb0
· simp
rcases lt_or_le c b with h | h
· rw [mod_eq_of_lt, mod_eq_of_lt h]
rwa [Nat.sub_lt_sub_iff_right (one_le_pow c a ha0), Nat.pow_lt_pow_iff_right ha1]
· suffices a ^ (c - b + b) - 1 = a ^ (c - b) * (a ^ b - 1) + (a ^ (c - b) - 1) by
rw [← Nat.sub_add_cancel h, add_mod_right, this, add_mod, mul_mod, mod_self,
mul_zero, zero_mod, zero_add, mod_mod, pow_sub_one_mod_pow_sub_one]
rw [← Nat.add_sub_assoc (one_le_pow (c - b) a ha0), ← mul_add_one, pow_add,
Nat.sub_add_cancel (one_le_pow b a ha0)]
@[simp]
theorem pow_sub_one_gcd_pow_sub_one (a b c : ℕ) :
gcd (a ^ b - 1) (a ^ c - 1) = a ^ gcd b c - 1 := by
rcases eq_zero_or_pos b with rfl | hb
· simp
replace hb : c % b < b := mod_lt c hb
rw [gcd_rec, pow_sub_one_mod_pow_sub_one, pow_sub_one_gcd_pow_sub_one, ← gcd_rec]
| /-! ### `lcm` -/
| Mathlib/Data/Nat/GCD/Basic.lean | 63 | 64 |
/-
Copyright (c) 2021 Thomas Browning. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Thomas Browning
-/
import Mathlib.GroupTheory.Index
/-!
# Complements
In this file we define the complement of a subgroup.
## Main definitions
- `Subgroup.IsComplement S T` where `S` and `T` are subsets of `G` states that every `g : G` can be
written uniquely as a product `s * t` for `s ∈ S`, `t ∈ T`.
- `H.LeftTransversal` where `H` is a subgroup of `G` is the type of all left-complements of `H`,
i.e. the set of all `S : Set G` that contain exactly one element of each left coset of `H`.
- `H.RightTransversal` where `H` is a subgroup of `G` is the set of all right-complements of `H`,
i.e. the set of all `T : Set G` that contain exactly one element of each right coset of `H`.
## Main results
- `isComplement'_of_coprime` : Subgroups of coprime order are complements.
-/
open Function Set
open scoped Pointwise
namespace Subgroup
variable {G : Type*} [Group G] (H K : Subgroup G) (S T : Set G)
/-- `S` and `T` are complements if `(*) : S × T → G` is a bijection.
This notion generalizes left transversals, right transversals, and complementary subgroups. -/
@[to_additive "`S` and `T` are complements if `(+) : S × T → G` is a bijection"]
def IsComplement : Prop :=
Function.Bijective fun x : S × T => x.1.1 * x.2.1
/-- `H` and `K` are complements if `(*) : H × K → G` is a bijection -/
@[to_additive "`H` and `K` are complements if `(+) : H × K → G` is a bijection"]
abbrev IsComplement' :=
IsComplement (H : Set G) (K : Set G)
/-- The set of left-complements of `T : Set G` -/
@[to_additive (attr := deprecated IsComplement (since := "2024-12-18"))
"The set of left-complements of `T : Set G`"]
def leftTransversals : Set (Set G) :=
{ S : Set G | IsComplement S T }
/-- The set of right-complements of `S : Set G` -/
@[to_additive (attr := deprecated IsComplement (since := "2024-12-18"))
"The set of right-complements of `S : Set G`"]
def rightTransversals : Set (Set G) :=
{ T : Set G | IsComplement S T }
variable {H K S T}
@[to_additive]
theorem isComplement'_def : IsComplement' H K ↔ IsComplement (H : Set G) (K : Set G) :=
Iff.rfl
@[to_additive]
theorem isComplement_iff_existsUnique :
IsComplement S T ↔ ∀ g : G, ∃! x : S × T, x.1.1 * x.2.1 = g :=
Function.bijective_iff_existsUnique _
@[to_additive]
theorem IsComplement.existsUnique (h : IsComplement S T) (g : G) :
∃! x : S × T, x.1.1 * x.2.1 = g :=
isComplement_iff_existsUnique.mp h g
@[to_additive]
theorem IsComplement'.symm (h : IsComplement' H K) : IsComplement' K H := by
let ϕ : H × K ≃ K × H :=
Equiv.mk (fun x => ⟨x.2⁻¹, x.1⁻¹⟩) (fun x => ⟨x.2⁻¹, x.1⁻¹⟩)
(fun x => Prod.ext (inv_inv _) (inv_inv _)) fun x => Prod.ext (inv_inv _) (inv_inv _)
let ψ : G ≃ G := Equiv.mk (fun g : G => g⁻¹) (fun g : G => g⁻¹) inv_inv inv_inv
suffices hf : (ψ ∘ fun x : H × K => x.1.1 * x.2.1) = (fun x : K × H => x.1.1 * x.2.1) ∘ ϕ by
rw [isComplement'_def, IsComplement, ← Equiv.bijective_comp ϕ]
apply (congr_arg Function.Bijective hf).mp -- Porting note: This was a `rw` in mathlib3
rwa [ψ.comp_bijective]
exact funext fun x => mul_inv_rev _ _
@[to_additive]
theorem isComplement'_comm : IsComplement' H K ↔ IsComplement' K H :=
⟨IsComplement'.symm, IsComplement'.symm⟩
@[to_additive]
theorem isComplement_univ_singleton {g : G} : IsComplement (univ : Set G) {g} :=
⟨fun ⟨_, _, rfl⟩ ⟨_, _, rfl⟩ h => Prod.ext (Subtype.ext (mul_right_cancel h)) rfl, fun x =>
⟨⟨⟨x * g⁻¹, ⟨⟩⟩, g, rfl⟩, inv_mul_cancel_right x g⟩⟩
@[to_additive]
theorem isComplement_singleton_univ {g : G} : IsComplement ({g} : Set G) univ :=
⟨fun ⟨⟨_, rfl⟩, _⟩ ⟨⟨_, rfl⟩, _⟩ h => Prod.ext rfl (Subtype.ext (mul_left_cancel h)), fun x =>
⟨⟨⟨g, rfl⟩, g⁻¹ * x, ⟨⟩⟩, mul_inv_cancel_left g x⟩⟩
@[to_additive]
theorem isComplement_singleton_left {g : G} : IsComplement {g} S ↔ S = univ := by
refine
⟨fun h => top_le_iff.mp fun x _ => ?_, fun h => (congr_arg _ h).mpr isComplement_singleton_univ⟩
obtain ⟨⟨⟨z, rfl : z = g⟩, y, _⟩, hy⟩ := h.2 (g * x)
rwa [← mul_left_cancel hy]
@[to_additive]
theorem isComplement_singleton_right {g : G} : IsComplement S {g} ↔ S = univ := by
refine
⟨fun h => top_le_iff.mp fun x _ => ?_, fun h => h ▸ isComplement_univ_singleton⟩
obtain ⟨y, hy⟩ := h.2 (x * g)
conv_rhs at hy => rw [← show y.2.1 = g from y.2.2]
rw [← mul_right_cancel hy]
exact y.1.2
@[to_additive]
theorem isComplement_univ_left : IsComplement univ S ↔ ∃ g : G, S = {g} := by
refine
⟨fun h => Set.exists_eq_singleton_iff_nonempty_subsingleton.mpr ⟨?_, fun a ha b hb => ?_⟩, ?_⟩
· obtain ⟨a, _⟩ := h.2 1
exact ⟨a.2.1, a.2.2⟩
· have : (⟨⟨_, mem_top a⁻¹⟩, ⟨a, ha⟩⟩ : (⊤ : Set G) × S) = ⟨⟨_, mem_top b⁻¹⟩, ⟨b, hb⟩⟩ :=
h.1 ((inv_mul_cancel a).trans (inv_mul_cancel b).symm)
exact Subtype.ext_iff.mp (Prod.ext_iff.mp this).2
· rintro ⟨g, rfl⟩
exact isComplement_univ_singleton
@[to_additive]
theorem isComplement_univ_right : IsComplement S univ ↔ ∃ g : G, S = {g} := by
refine
⟨fun h => Set.exists_eq_singleton_iff_nonempty_subsingleton.mpr ⟨?_, fun a ha b hb => ?_⟩, ?_⟩
· obtain ⟨a, _⟩ := h.2 1
exact ⟨a.1.1, a.1.2⟩
· have : (⟨⟨a, ha⟩, ⟨_, mem_top a⁻¹⟩⟩ : S × (⊤ : Set G)) = ⟨⟨b, hb⟩, ⟨_, mem_top b⁻¹⟩⟩ :=
h.1 ((mul_inv_cancel a).trans (mul_inv_cancel b).symm)
exact Subtype.ext_iff.mp (Prod.ext_iff.mp this).1
· rintro ⟨g, rfl⟩
exact isComplement_singleton_univ
@[to_additive]
lemma IsComplement.mul_eq (h : IsComplement S T) : S * T = univ :=
eq_univ_of_forall fun x ↦ by simpa [mem_mul] using (h.existsUnique x).exists
@[to_additive (attr := simp)]
lemma not_isComplement_empty_left : ¬ IsComplement ∅ T :=
fun h ↦ by simpa [eq_comm (a := ∅)] using h.mul_eq
@[to_additive (attr := simp)]
lemma not_isComplement_empty_right : ¬ IsComplement S ∅ :=
fun h ↦ by simpa [eq_comm (a := ∅)] using h.mul_eq
@[to_additive]
lemma IsComplement.nonempty_left (hst : IsComplement S T) : S.Nonempty := by
contrapose! hst; simp [hst]
@[to_additive]
lemma IsComplement.nonempty_right (hst : IsComplement S T) : T.Nonempty := by
contrapose! hst; simp [hst]
@[to_additive] lemma IsComplement.pairwiseDisjoint_smul (hst : IsComplement S T) :
S.PairwiseDisjoint (· • T) := fun a ha b hb hab ↦ disjoint_iff_forall_ne.2 <| by
rintro _ ⟨c, hc, rfl⟩ _ ⟨d, hd, rfl⟩
exact hst.1.ne (a₁ := (⟨a, ha⟩, ⟨c, hc⟩)) (a₂:= (⟨b, hb⟩, ⟨d, hd⟩)) (by simp [hab])
@[to_additive AddSubgroup.IsComplement.card_mul_card]
lemma IsComplement.card_mul_card (h : IsComplement S T) : Nat.card S * Nat.card T = Nat.card G :=
(Nat.card_prod _ _).symm.trans <| Nat.card_congr <| Equiv.ofBijective _ h
@[to_additive]
theorem isComplement'_top_bot : IsComplement' (⊤ : Subgroup G) ⊥ :=
isComplement_univ_singleton
@[to_additive]
theorem isComplement'_bot_top : IsComplement' (⊥ : Subgroup G) ⊤ :=
isComplement_singleton_univ
@[to_additive (attr := simp)]
theorem isComplement'_bot_left : IsComplement' ⊥ H ↔ H = ⊤ :=
isComplement_singleton_left.trans coe_eq_univ
@[to_additive (attr := simp)]
theorem isComplement'_bot_right : IsComplement' H ⊥ ↔ H = ⊤ :=
isComplement_singleton_right.trans coe_eq_univ
@[to_additive (attr := simp)]
theorem isComplement'_top_left : IsComplement' ⊤ H ↔ H = ⊥ :=
isComplement_univ_left.trans coe_eq_singleton
@[to_additive (attr := simp)]
theorem isComplement'_top_right : IsComplement' H ⊤ ↔ H = ⊥ :=
isComplement_univ_right.trans coe_eq_singleton
@[to_additive]
lemma isComplement_iff_existsUnique_inv_mul_mem :
IsComplement S T ↔ ∀ g, ∃! s : S, (s : G)⁻¹ * g ∈ T := by
convert isComplement_iff_existsUnique with g
constructor <;> rintro ⟨x, hx, hx'⟩
· exact ⟨(x, ⟨_, hx⟩), by simp, by aesop⟩
· exact ⟨x.1, by simp [← hx], fun y hy ↦ (Prod.ext_iff.1 <| by simpa using hx' (y, ⟨_, hy⟩)).1⟩
set_option linter.deprecated false in
@[to_additive
(attr := deprecated isComplement_iff_existsUnique_inv_mul_mem (since := "2024-12-18"))]
theorem mem_leftTransversals_iff_existsUnique_inv_mul_mem :
S ∈ leftTransversals T ↔ ∀ g : G, ∃! s : S, (s : G)⁻¹ * g ∈ T := by
rw [leftTransversals, Set.mem_setOf_eq, isComplement_iff_existsUnique]
refine ⟨fun h g => ?_, fun h g => ?_⟩
· obtain ⟨x, h1, h2⟩ := h g
exact
⟨x.1, (congr_arg (· ∈ T) (eq_inv_mul_of_mul_eq h1)).mp x.2.2, fun y hy =>
(Prod.ext_iff.mp (h2 ⟨y, (↑y)⁻¹ * g, hy⟩ (mul_inv_cancel_left ↑y g))).1⟩
· obtain ⟨x, h1, h2⟩ := h g
refine ⟨⟨x, (↑x)⁻¹ * g, h1⟩, mul_inv_cancel_left (↑x) g, fun y hy => ?_⟩
have hf := h2 y.1 ((congr_arg (· ∈ T) (eq_inv_mul_of_mul_eq hy)).mp y.2.2)
exact Prod.ext hf (Subtype.ext (eq_inv_mul_of_mul_eq (hf ▸ hy)))
@[to_additive]
lemma isComplement_iff_existsUnique_mul_inv_mem :
IsComplement S T ↔ ∀ g, ∃! t : T, g * (t : G)⁻¹ ∈ S := by
convert isComplement_iff_existsUnique with g
constructor <;> rintro ⟨x, hx, hx'⟩
· exact ⟨(⟨_, hx⟩, x), by simp, by aesop⟩
· exact ⟨x.2, by simp [← hx], fun y hy ↦ (Prod.ext_iff.1 <| by simpa using hx' (⟨_, hy⟩, y)).2⟩
set_option linter.deprecated false in
@[to_additive
(attr := deprecated isComplement_iff_existsUnique_mul_inv_mem (since := "2024-12-18"))]
theorem mem_rightTransversals_iff_existsUnique_mul_inv_mem :
S ∈ rightTransversals T ↔ ∀ g : G, ∃! s : S, g * (s : G)⁻¹ ∈ T := by
rw [rightTransversals, Set.mem_setOf_eq, isComplement_iff_existsUnique]
refine ⟨fun h g => ?_, fun h g => ?_⟩
· obtain ⟨x, h1, h2⟩ := h g
exact
⟨x.2, (congr_arg (· ∈ T) (eq_mul_inv_of_mul_eq h1)).mp x.1.2, fun y hy =>
(Prod.ext_iff.mp (h2 ⟨⟨g * (↑y)⁻¹, hy⟩, y⟩ (inv_mul_cancel_right g y))).2⟩
· obtain ⟨x, h1, h2⟩ := h g
refine ⟨⟨⟨g * (↑x)⁻¹, h1⟩, x⟩, inv_mul_cancel_right g x, fun y hy => ?_⟩
have hf := h2 y.2 ((congr_arg (· ∈ T) (eq_mul_inv_of_mul_eq hy)).mp y.1.2)
exact Prod.ext (Subtype.ext (eq_mul_inv_of_mul_eq (hf ▸ hy))) hf
@[to_additive]
lemma isComplement_subgroup_right_iff_existsUnique_quotientGroupMk :
IsComplement S H ↔ ∀ q : G ⧸ H, ∃! s : S, QuotientGroup.mk s.1 = q := by
simp_rw [isComplement_iff_existsUnique_inv_mul_mem, SetLike.mem_coe, ← QuotientGroup.eq,
QuotientGroup.forall_mk]
set_option linter.deprecated false in
@[to_additive
(attr := deprecated isComplement_subgroup_right_iff_existsUnique_quotientGroupMk
(since := "2024-12-18"))]
theorem mem_leftTransversals_iff_existsUnique_quotient_mk''_eq :
S ∈ leftTransversals (H : Set G) ↔
∀ q : Quotient (QuotientGroup.leftRel H), ∃! s : S, Quotient.mk'' s.1 = q := by
simp_rw [mem_leftTransversals_iff_existsUnique_inv_mul_mem, SetLike.mem_coe, ←
QuotientGroup.eq]
exact ⟨fun h q => Quotient.inductionOn' q h, fun h g => h (Quotient.mk'' g)⟩
set_option linter.docPrime false in
@[to_additive]
lemma isComplement_subgroup_left_iff_existsUnique_quotientMk'' :
IsComplement H T ↔
∀ q : Quotient (QuotientGroup.rightRel H), ∃! t : T, Quotient.mk'' t.1 = q := by
simp_rw [isComplement_iff_existsUnique_mul_inv_mem, SetLike.mem_coe,
← QuotientGroup.rightRel_apply, ← Quotient.eq'', Quotient.forall]
set_option linter.deprecated false in
@[to_additive
(attr := deprecated isComplement_subgroup_left_iff_existsUnique_quotientMk''
(since := "2024-12-18"))]
theorem mem_rightTransversals_iff_existsUnique_quotient_mk''_eq :
S ∈ rightTransversals (H : Set G) ↔
∀ q : Quotient (QuotientGroup.rightRel H), ∃! s : S, Quotient.mk'' s.1 = q := by
simp_rw [mem_rightTransversals_iff_existsUnique_mul_inv_mem, SetLike.mem_coe, ←
QuotientGroup.rightRel_apply, ← Quotient.eq'']
exact ⟨fun h q => Quotient.inductionOn' q h, fun h g => h (Quotient.mk'' g)⟩
@[to_additive]
lemma isComplement_subgroup_right_iff_bijective :
IsComplement S H ↔ Bijective (S.restrict (QuotientGroup.mk : G → G ⧸ H)) :=
isComplement_subgroup_right_iff_existsUnique_quotientGroupMk.trans
(bijective_iff_existsUnique (S.restrict QuotientGroup.mk)).symm
set_option linter.deprecated false in
@[to_additive
(attr := deprecated isComplement_subgroup_right_iff_bijective (since := "2024-12-18"))]
theorem mem_leftTransversals_iff_bijective :
S ∈ leftTransversals (H : Set G) ↔
Function.Bijective (S.restrict (Quotient.mk'' : G → Quotient (QuotientGroup.leftRel H))) :=
mem_leftTransversals_iff_existsUnique_quotient_mk''_eq.trans
(Function.bijective_iff_existsUnique (S.restrict Quotient.mk'')).symm
@[to_additive]
lemma isComplement_subgroup_left_iff_bijective :
IsComplement H T ↔
Bijective (T.restrict (Quotient.mk'' : G → Quotient (QuotientGroup.rightRel H))) :=
isComplement_subgroup_left_iff_existsUnique_quotientMk''.trans
(bijective_iff_existsUnique (T.restrict Quotient.mk'')).symm
set_option linter.deprecated false in
@[to_additive
(attr := deprecated isComplement_subgroup_left_iff_bijective (since := "2024-12-18"))]
theorem mem_rightTransversals_iff_bijective :
S ∈ rightTransversals (H : Set G) ↔
Function.Bijective (S.restrict (Quotient.mk'' : G → Quotient (QuotientGroup.rightRel H))) :=
mem_rightTransversals_iff_existsUnique_quotient_mk''_eq.trans
(Function.bijective_iff_existsUnique (S.restrict Quotient.mk'')).symm
@[to_additive]
lemma IsComplement.card_left (h : IsComplement S H) : Nat.card S = H.index :=
Nat.card_congr <| .ofBijective _ <| isComplement_subgroup_right_iff_bijective.mp h
set_option linter.deprecated false in
@[to_additive (attr := deprecated IsComplement.card_left (since := "2024-12-18"))]
theorem card_left_transversal (h : S ∈ leftTransversals (H : Set G)) : Nat.card S = H.index :=
Nat.card_congr <| Equiv.ofBijective _ <| mem_leftTransversals_iff_bijective.mp h
@[to_additive]
lemma IsComplement.card_right (h : IsComplement H T) : Nat.card T = H.index :=
Nat.card_congr <| (Equiv.ofBijective _ <| isComplement_subgroup_left_iff_bijective.mp h).trans <|
QuotientGroup.quotientRightRelEquivQuotientLeftRel H
set_option linter.deprecated false in
@[to_additive (attr := deprecated IsComplement.card_right (since := "2024-12-18"))]
theorem card_right_transversal (h : S ∈ rightTransversals (H : Set G)) : Nat.card S = H.index :=
Nat.card_congr <|
(Equiv.ofBijective _ <| mem_rightTransversals_iff_bijective.mp h).trans <|
QuotientGroup.quotientRightRelEquivQuotientLeftRel H
@[to_additive]
lemma isComplement_range_left {f : G ⧸ H → G} (hf : ∀ q, ↑(f q) = q) :
IsComplement (range f) H := by
rw [isComplement_subgroup_right_iff_bijective]
refine ⟨?_, fun q ↦ ⟨⟨f q, q, rfl⟩, hf q⟩⟩
rintro ⟨-, q₁, rfl⟩ ⟨-, q₂, rfl⟩ h
exact Subtype.ext <| congr_arg f <| ((hf q₁).symm.trans h).trans (hf q₂)
set_option linter.deprecated false in
@[to_additive (attr := deprecated isComplement_range_left (since := "2024-12-18"))]
theorem range_mem_leftTransversals {f : G ⧸ H → G} (hf : ∀ q, ↑(f q) = q) :
Set.range f ∈ leftTransversals (H : Set G) :=
mem_leftTransversals_iff_bijective.mpr
⟨by rintro ⟨-, q₁, rfl⟩ ⟨-, q₂, rfl⟩ h
exact Subtype.ext <| congr_arg f <| ((hf q₁).symm.trans h).trans (hf q₂),
fun q => ⟨⟨f q, q, rfl⟩, hf q⟩⟩
@[to_additive]
lemma isComplement_range_right {f : Quotient (QuotientGroup.rightRel H) → G}
(hf : ∀ q, Quotient.mk'' (f q) = q) : IsComplement H (range f) := by
rw [isComplement_subgroup_left_iff_bijective]
refine ⟨?_, fun q ↦ ⟨⟨f q, q, rfl⟩, hf q⟩⟩
rintro ⟨-, q₁, rfl⟩ ⟨-, q₂, rfl⟩ h
exact Subtype.ext <| congr_arg f <| ((hf q₁).symm.trans h).trans (hf q₂)
set_option linter.deprecated false in
@[to_additive (attr := deprecated isComplement_range_right (since := "2024-12-18"))]
theorem range_mem_rightTransversals {f : Quotient (QuotientGroup.rightRel H) → G}
(hf : ∀ q, Quotient.mk'' (f q) = q) : Set.range f ∈ rightTransversals (H : Set G) :=
mem_rightTransversals_iff_bijective.mpr
⟨by rintro ⟨-, q₁, rfl⟩ ⟨-, q₂, rfl⟩ h
exact Subtype.ext <| congr_arg f <| ((hf q₁).symm.trans h).trans (hf q₂),
fun q => ⟨⟨f q, q, rfl⟩, hf q⟩⟩
@[to_additive]
lemma exists_isComplement_left (H : Subgroup G) (g : G) : ∃ S, IsComplement S H ∧ g ∈ S := by
classical
refine ⟨Set.range (Function.update Quotient.out _ g), isComplement_range_left fun q ↦ ?_,
QuotientGroup.mk g, Function.update_self (Quotient.mk'' g) g Quotient.out⟩
by_cases hq : q = Quotient.mk'' g
· exact hq.symm ▸ congr_arg _ (Function.update_self (Quotient.mk'' g) g Quotient.out)
· refine Function.update_of_ne ?_ g Quotient.out ▸ q.out_eq'
exact hq
set_option linter.deprecated false in
@[to_additive (attr := deprecated exists_isComplement_left (since := "2024-12-18"))]
lemma exists_left_transversal (H : Subgroup G) (g : G) :
∃ S ∈ leftTransversals (H : Set G), g ∈ S := by
classical
refine
⟨Set.range (Function.update Quotient.out _ g), range_mem_leftTransversals fun q => ?_,
Quotient.mk'' g, Function.update_self (Quotient.mk'' g) g Quotient.out⟩
by_cases hq : q = Quotient.mk'' g
· exact hq.symm ▸ congr_arg _ (Function.update_self (Quotient.mk'' g) g Quotient.out)
· refine (Function.update_of_ne ?_ g Quotient.out) ▸ q.out_eq'
exact hq
@[to_additive]
lemma exists_isComplement_right (H : Subgroup G) (g : G) :
∃ T, IsComplement H T ∧ g ∈ T := by
classical
refine ⟨Set.range (Function.update Quotient.out _ g), isComplement_range_right fun q ↦ ?_,
Quotient.mk'' g, Function.update_self (Quotient.mk'' g) g Quotient.out⟩
by_cases hq : q = Quotient.mk'' g
· exact hq.symm ▸ congr_arg _ (Function.update_self (Quotient.mk'' g) g Quotient.out)
· refine Function.update_of_ne ?_ g Quotient.out ▸ q.out_eq'
exact hq
set_option linter.deprecated false in
@[to_additive (attr := deprecated exists_isComplement_right (since := "2024-12-18"))]
lemma exists_right_transversal (H : Subgroup G) (g : G) :
∃ S ∈ rightTransversals (H : Set G), g ∈ S := by
classical
refine
⟨Set.range (Function.update Quotient.out _ g), range_mem_rightTransversals fun q => ?_,
Quotient.mk'' g, Function.update_self (Quotient.mk'' g) g Quotient.out⟩
by_cases hq : q = Quotient.mk'' g
· exact hq.symm ▸ congr_arg _ (Function.update_self (Quotient.mk'' g) g Quotient.out)
· exact Eq.trans (congr_arg _ (Function.update_of_ne hq g Quotient.out)) q.out_eq'
/-- Given two subgroups `H' ⊆ H`, there exists a left transversal to `H'` inside `H`. -/
@[to_additive "Given two subgroups `H' ⊆ H`, there exists a transversal to `H'` inside `H`"]
lemma exists_left_transversal_of_le {H' H : Subgroup G} (h : H' ≤ H) :
∃ S : Set G, S * H' = H ∧ Nat.card S * Nat.card H' = Nat.card H := by
let H'' : Subgroup H := H'.comap H.subtype
have : H' = H''.map H.subtype := by simp [H'', h]
rw [this]
obtain ⟨S, cmem, -⟩ := H''.exists_isComplement_left 1
refine ⟨H.subtype '' S, ?_, ?_⟩
· have : H.subtype '' (S * H'') = H.subtype '' S * H''.map H.subtype := image_mul H.subtype
rw [← this, cmem.mul_eq]
simp [Set.ext_iff]
· rw [← cmem.card_mul_card]
refine congr_arg₂ (· * ·) ?_ ?_ <;>
exact Nat.card_congr (Equiv.Set.image _ _ <| subtype_injective H).symm
/-- Given two subgroups `H' ⊆ H`, there exists a right transversal to `H'` inside `H`. -/
@[to_additive "Given two subgroups `H' ⊆ H`, there exists a transversal to `H'` inside `H`"]
lemma exists_right_transversal_of_le {H' H : Subgroup G} (h : H' ≤ H) :
∃ S : Set G, H' * S = H ∧ Nat.card H' * Nat.card S = Nat.card H := by
let H'' : Subgroup H := H'.comap H.subtype
have : H' = H''.map H.subtype := by simp [H'', h]
rw [this]
obtain ⟨S, cmem, -⟩ := H''.exists_isComplement_right 1
refine ⟨H.subtype '' S, ?_, ?_⟩
· have : H.subtype '' (H'' * S) = H''.map H.subtype * H.subtype '' S := image_mul H.subtype
rw [← this, cmem.mul_eq]
simp [Set.ext_iff]
· have : Nat.card H'' * Nat.card S = Nat.card H := cmem.card_mul_card
rw [← this]
refine congr_arg₂ (· * ·) ?_ ?_ <;>
exact Nat.card_congr (Equiv.Set.image _ _ <| subtype_injective H).symm
namespace IsComplement
/-- The equivalence `G ≃ S × T`, such that the inverse is `(*) : S × T → G` -/
noncomputable def equiv {S T : Set G} (hST : IsComplement S T) : G ≃ S × T :=
(Equiv.ofBijective (fun x : S × T => x.1.1 * x.2.1) hST).symm
variable (hST : IsComplement S T) (hHT : IsComplement H T) (hSK : IsComplement S K)
@[simp] theorem equiv_symm_apply (x : S × T) : (hST.equiv.symm x : G) = x.1.1 * x.2.1 := rfl
@[simp]
theorem equiv_fst_mul_equiv_snd (g : G) : ↑(hST.equiv g).fst * (hST.equiv g).snd = g :=
(Equiv.ofBijective (fun x : S × T => x.1.1 * x.2.1) hST).right_inv g
theorem equiv_fst_eq_mul_inv (g : G) : ↑(hST.equiv g).fst = g * ((hST.equiv g).snd : G)⁻¹ :=
eq_mul_inv_of_mul_eq (hST.equiv_fst_mul_equiv_snd g)
theorem equiv_snd_eq_inv_mul (g : G) : ↑(hST.equiv g).snd = ((hST.equiv g).fst : G)⁻¹ * g :=
eq_inv_mul_of_mul_eq (hST.equiv_fst_mul_equiv_snd g)
theorem equiv_fst_eq_iff_leftCosetEquivalence {g₁ g₂ : G} :
(hSK.equiv g₁).fst = (hSK.equiv g₂).fst ↔ LeftCosetEquivalence K g₁ g₂ := by
rw [LeftCosetEquivalence, leftCoset_eq_iff]
constructor
· intro h
rw [← hSK.equiv_fst_mul_equiv_snd g₂, ← hSK.equiv_fst_mul_equiv_snd g₁, ← h,
mul_inv_rev, ← mul_assoc, inv_mul_cancel_right, ← coe_inv, ← coe_mul]
exact Subtype.property _
· intro h
apply (isComplement_iff_existsUnique_inv_mul_mem.1 hSK g₁).unique
· -- This used to be `simp [...]` before https://github.com/leanprover/lean4/pull/2644
rw [equiv_fst_eq_mul_inv]; simp
· rw [SetLike.mem_coe, ← mul_mem_cancel_right h]
-- This used to be `simp [...]` before https://github.com/leanprover/lean4/pull/2644
rw [equiv_fst_eq_mul_inv]; simp [equiv_fst_eq_mul_inv, ← mul_assoc]
theorem equiv_snd_eq_iff_rightCosetEquivalence {g₁ g₂ : G} :
(hHT.equiv g₁).snd = (hHT.equiv g₂).snd ↔ RightCosetEquivalence H g₁ g₂ := by
rw [RightCosetEquivalence, rightCoset_eq_iff]
constructor
· intro h
rw [← hHT.equiv_fst_mul_equiv_snd g₂, ← hHT.equiv_fst_mul_equiv_snd g₁, ← h,
mul_inv_rev, mul_assoc, mul_inv_cancel_left, ← coe_inv, ← coe_mul]
exact Subtype.property _
· intro h
apply (isComplement_iff_existsUnique_mul_inv_mem.1 hHT g₁).unique
· -- This used to be `simp [...]` before https://github.com/leanprover/lean4/pull/2644
rw [equiv_snd_eq_inv_mul]; simp
· rw [SetLike.mem_coe, ← mul_mem_cancel_left h]
-- This used to be `simp [...]` before https://github.com/leanprover/lean4/pull/2644
rw [equiv_snd_eq_inv_mul, mul_assoc]; simp
theorem leftCosetEquivalence_equiv_fst (g : G) :
LeftCosetEquivalence K g ((hSK.equiv g).fst : G) := by
-- This used to be `simp [...]` before https://github.com/leanprover/lean4/pull/2644
rw [equiv_fst_eq_mul_inv]; simp [LeftCosetEquivalence, leftCoset_eq_iff]
theorem rightCosetEquivalence_equiv_snd (g : G) :
RightCosetEquivalence H g ((hHT.equiv g).snd : G) := by
-- This used to be `simp [...]` before https://github.com/leanprover/lean4/pull/2644
rw [RightCosetEquivalence, rightCoset_eq_iff, equiv_snd_eq_inv_mul]; simp
theorem equiv_fst_eq_self_of_mem_of_one_mem {g : G} (h1 : 1 ∈ T) (hg : g ∈ S) :
(hST.equiv g).fst = ⟨g, hg⟩ := by
| have : hST.equiv.symm (⟨g, hg⟩, ⟨1, h1⟩) = g := by
rw [equiv, Equiv.ofBijective]; simp
conv_lhs => rw [← this, Equiv.apply_symm_apply]
theorem equiv_snd_eq_self_of_mem_of_one_mem {g : G} (h1 : 1 ∈ S) (hg : g ∈ T) :
(hST.equiv g).snd = ⟨g, hg⟩ := by
have : hST.equiv.symm (⟨1, h1⟩, ⟨g, hg⟩) = g := by
rw [equiv, Equiv.ofBijective]; simp
| Mathlib/GroupTheory/Complement.lean | 505 | 512 |
/-
Copyright (c) 2020 Sébastien Gouëzel. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Sébastien Gouëzel, Floris van Doorn
-/
import Mathlib.Geometry.Manifold.MFDeriv.Atlas
import Mathlib.Geometry.Manifold.VectorBundle.Basic
/-!
# Unique derivative sets in manifolds
In this file, we prove various properties of unique derivative sets in manifolds.
* `image_denseRange`: suppose `f` is differentiable on `s` and its derivative at every point of `s`
has dense range. If `s` has the unique differential property, then so does `f '' s`.
* `uniqueMDiffOn_preimage`: the unique differential property is preserved by local diffeomorphisms
* `uniqueDiffOn_target_inter`: the unique differential property is preserved by
pullbacks of extended charts
* `tangentBundle_proj_preimage`: if `s` has the unique differential property,
its preimage under the tangent bundle projection also has
-/
noncomputable section
open scoped Manifold
open Set
/-! ### Unique derivative sets in manifolds -/
section UniqueMDiff
variable {𝕜 : Type*} [NontriviallyNormedField 𝕜] {E : Type*} [NormedAddCommGroup E]
[NormedSpace 𝕜 E] {H : Type*} [TopologicalSpace H] {I : ModelWithCorners 𝕜 E H} {M : Type*}
[TopologicalSpace M] [ChartedSpace H M] {E' : Type*}
[NormedAddCommGroup E'] [NormedSpace 𝕜 E'] {H' : Type*} [TopologicalSpace H']
{I' : ModelWithCorners 𝕜 E' H'} {M' : Type*} [TopologicalSpace M'] [ChartedSpace H' M']
{M'' : Type*} [TopologicalSpace M''] [ChartedSpace H' M'']
{s : Set M} {x : M}
section
/-- If `s` has the unique differential property at `x`, `f` is differentiable within `s` at x` and
its derivative has dense range, then `f '' s` has the unique differential property at `f x`. -/
theorem UniqueMDiffWithinAt.image_denseRange (hs : UniqueMDiffWithinAt I s x)
{f : M → M'} {f' : E →L[𝕜] E'} (hf : HasMFDerivWithinAt I I' f s x f')
(hd : DenseRange f') : UniqueMDiffWithinAt I' (f '' s) (f x) := by
/- Rewrite in coordinates, apply `HasFDerivWithinAt.uniqueDiffWithinAt`. -/
have := hs.inter' <| hf.1 (extChartAt_source_mem_nhds (I := I') (f x))
refine (((hf.2.mono ?sub1).uniqueDiffWithinAt this hd).mono ?sub2).congr_pt ?pt
case pt => simp only [mfld_simps]
case sub1 => mfld_set_tac
case sub2 =>
rintro _ ⟨y, ⟨⟨hys, hfy⟩, -⟩, rfl⟩
exact ⟨⟨_, hys, ((extChartAt I' (f x)).left_inv hfy).symm⟩, mem_range_self _⟩
/-- If `s` has the unique differential property, `f` is differentiable on `s` and its derivative
at every point of `s` has dense range, then `f '' s` has the unique differential property.
This version uses the `HasMFDerivWithinAt` predicate. -/
theorem UniqueMDiffOn.image_denseRange' (hs : UniqueMDiffOn I s) {f : M → M'}
{f' : M → E →L[𝕜] E'} (hf : ∀ x ∈ s, HasMFDerivWithinAt I I' f s x (f' x))
(hd : ∀ x ∈ s, DenseRange (f' x)) :
UniqueMDiffOn I' (f '' s) :=
forall_mem_image.2 fun x hx ↦ (hs x hx).image_denseRange (hf x hx) (hd x hx)
/-- If `s` has the unique differential property, `f` is differentiable on `s` and its derivative
at every point of `s` has dense range, then `f '' s` has the unique differential property. -/
theorem UniqueMDiffOn.image_denseRange (hs : UniqueMDiffOn I s) {f : M → M'}
(hf : MDifferentiableOn I I' f s) (hd : ∀ x ∈ s, DenseRange (mfderivWithin I I' f s x)) :
UniqueMDiffOn I' (f '' s) :=
hs.image_denseRange' (fun x hx ↦ (hf x hx).hasMFDerivWithinAt) hd
protected theorem UniqueMDiffWithinAt.preimage_partialHomeomorph (hs : UniqueMDiffWithinAt I s x)
{e : PartialHomeomorph M M'} (he : e.MDifferentiable I I') (hx : x ∈ e.source) :
UniqueMDiffWithinAt I' (e.target ∩ e.symm ⁻¹' s) (e x) := by
rw [← e.image_source_inter_eq', inter_comm]
exact (hs.inter (e.open_source.mem_nhds hx)).image_denseRange
(he.mdifferentiableAt hx).hasMFDerivAt.hasMFDerivWithinAt
(he.mfderiv_surjective hx).denseRange
/-- If a set has the unique differential property, then its image under a local
diffeomorphism also has the unique differential property. -/
theorem UniqueMDiffOn.uniqueMDiffOn_preimage (hs : UniqueMDiffOn I s) {e : PartialHomeomorph M M'}
(he : e.MDifferentiable I I') : UniqueMDiffOn I' (e.target ∩ e.symm ⁻¹' s) := fun _x hx ↦
e.right_inv hx.1 ▸ (hs _ hx.2).preimage_partialHomeomorph he (e.map_target hx.1)
variable [IsManifold I 1 M] in
/-- If a set in a manifold has the unique derivative property, then its pullback by any extended
chart, in the vector space, also has the unique derivative property. -/
theorem UniqueMDiffOn.uniqueMDiffOn_target_inter (hs : UniqueMDiffOn I s) (x : M) :
UniqueMDiffOn 𝓘(𝕜, E) ((extChartAt I x).target ∩ (extChartAt I x).symm ⁻¹' s) := by
-- this is just a reformulation of `UniqueMDiffOn.uniqueMDiffOn_preimage`, using as `e`
-- the local chart at `x`.
rw [← PartialEquiv.image_source_inter_eq', inter_comm, extChartAt_source]
exact (hs.inter (chartAt H x).open_source).image_denseRange'
(fun y hy ↦ hasMFDerivWithinAt_extChartAt hy.2)
fun y hy ↦ ((mdifferentiable_chart _).mfderiv_surjective hy.2).denseRange
variable [IsManifold I 1 M] in
| /-- If a set in a manifold has the unique derivative property, then its pullback by any extended
chart, in the vector space, also has the unique derivative property. -/
theorem UniqueMDiffOn.uniqueDiffOn_target_inter (hs : UniqueMDiffOn I s) (x : M) :
UniqueDiffOn 𝕜 ((extChartAt I x).target ∩ (extChartAt I x).symm ⁻¹' s) :=
(hs.uniqueMDiffOn_target_inter x).uniqueDiffOn
variable [IsManifold I 1 M] in
theorem UniqueMDiffOn.uniqueDiffWithinAt_range_inter (hs : UniqueMDiffOn I s) (x : M) (y : E)
(hy : y ∈ (extChartAt I x).target ∩ (extChartAt I x).symm ⁻¹' s) :
UniqueDiffWithinAt 𝕜 (range I ∩ (extChartAt I x).symm ⁻¹' s) y := by
| Mathlib/Geometry/Manifold/MFDeriv/UniqueDifferential.lean | 98 | 107 |
/-
Copyright (c) 2021 Yaël Dillies, Bhavik Mehta. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Yaël Dillies, Bhavik Mehta
-/
import Mathlib.Analysis.Convex.Topology
import Mathlib.Analysis.NormedSpace.Pointwise
import Mathlib.Analysis.Seminorm
import Mathlib.Analysis.LocallyConvex.Bounded
import Mathlib.Analysis.RCLike.Basic
/-!
# The Minkowski functional
This file defines the Minkowski functional, aka gauge.
The Minkowski functional of a set `s` is the function which associates each point to how much you
need to scale `s` for `x` to be inside it. When `s` is symmetric, convex and absorbent, its gauge is
a seminorm. Reciprocally, any seminorm arises as the gauge of some set, namely its unit ball. This
induces the equivalence of seminorms and locally convex topological vector spaces.
## Main declarations
For a real vector space,
* `gauge`: Aka Minkowski functional. `gauge s x` is the least (actually, an infimum) `r` such
that `x ∈ r • s`.
* `gaugeSeminorm`: The Minkowski functional as a seminorm, when `s` is symmetric, convex and
absorbent.
## References
* [H. H. Schaefer, *Topological Vector Spaces*][schaefer1966]
## Tags
Minkowski functional, gauge
-/
open NormedField Set
open scoped Pointwise Topology NNReal
noncomputable section
variable {𝕜 E : Type*}
section AddCommGroup
variable [AddCommGroup E] [Module ℝ E]
/-- The Minkowski functional. Given a set `s` in a real vector space, `gauge s` is the functional
which sends `x : E` to the smallest `r : ℝ` such that `x` is in `s` scaled by `r`. -/
def gauge (s : Set E) (x : E) : ℝ :=
sInf { r : ℝ | 0 < r ∧ x ∈ r • s }
variable {s t : Set E} {x : E} {a : ℝ}
theorem gauge_def : gauge s x = sInf ({ r ∈ Set.Ioi (0 : ℝ) | x ∈ r • s }) :=
rfl
/-- An alternative definition of the gauge using scalar multiplication on the element rather than on
the set. -/
theorem gauge_def' : gauge s x = sInf {r ∈ Set.Ioi (0 : ℝ) | r⁻¹ • x ∈ s} := by
congrm sInf {r | ?_}
exact and_congr_right fun hr => mem_smul_set_iff_inv_smul_mem₀ hr.ne' _ _
private theorem gauge_set_bddBelow : BddBelow { r : ℝ | 0 < r ∧ x ∈ r • s } :=
⟨0, fun _ hr => hr.1.le⟩
/-- If the given subset is `Absorbent` then the set we take an infimum over in `gauge` is nonempty,
which is useful for proving many properties about the gauge. -/
theorem Absorbent.gauge_set_nonempty (absorbs : Absorbent ℝ s) :
{ r : ℝ | 0 < r ∧ x ∈ r • s }.Nonempty :=
let ⟨r, hr₁, hr₂⟩ := (absorbs x).exists_pos
⟨r, hr₁, hr₂ r (Real.norm_of_nonneg hr₁.le).ge rfl⟩
theorem gauge_mono (hs : Absorbent ℝ s) (h : s ⊆ t) : gauge t ≤ gauge s := fun _ =>
csInf_le_csInf gauge_set_bddBelow hs.gauge_set_nonempty fun _ hr => ⟨hr.1, smul_set_mono h hr.2⟩
theorem exists_lt_of_gauge_lt (absorbs : Absorbent ℝ s) (h : gauge s x < a) :
∃ b, 0 < b ∧ b < a ∧ x ∈ b • s := by
obtain ⟨b, ⟨hb, hx⟩, hba⟩ := exists_lt_of_csInf_lt absorbs.gauge_set_nonempty h
exact ⟨b, hb, hba, hx⟩
/-- The gauge evaluated at `0` is always zero (mathematically this requires `0` to be in the set `s`
but, the real infimum of the empty set in Lean being defined as `0`, it holds unconditionally). -/
@[simp]
theorem gauge_zero : gauge s 0 = 0 := by
rw [gauge_def']
by_cases h : (0 : E) ∈ s
· simp only [smul_zero, sep_true, h, csInf_Ioi]
· simp only [smul_zero, sep_false, h, Real.sInf_empty]
@[simp]
theorem gauge_zero' : gauge (0 : Set E) = 0 := by
ext x
rw [gauge_def']
obtain rfl | hx := eq_or_ne x 0
· simp only [csInf_Ioi, mem_zero, Pi.zero_apply, eq_self_iff_true, sep_true, smul_zero]
· simp only [mem_zero, Pi.zero_apply, inv_eq_zero, smul_eq_zero]
convert Real.sInf_empty
exact eq_empty_iff_forall_not_mem.2 fun r hr => hr.2.elim (ne_of_gt hr.1) hx
@[simp]
theorem gauge_empty : gauge (∅ : Set E) = 0 := by
ext
simp only [gauge_def', Real.sInf_empty, mem_empty_iff_false, Pi.zero_apply, sep_false]
theorem gauge_of_subset_zero (h : s ⊆ 0) : gauge s = 0 := by
obtain rfl | rfl := subset_singleton_iff_eq.1 h
exacts [gauge_empty, gauge_zero']
/-- The gauge is always nonnegative. -/
theorem gauge_nonneg (x : E) : 0 ≤ gauge s x :=
Real.sInf_nonneg fun _ hx => hx.1.le
theorem gauge_neg (symmetric : ∀ x ∈ s, -x ∈ s) (x : E) : gauge s (-x) = gauge s x := by
have : ∀ x, -x ∈ s ↔ x ∈ s := fun x => ⟨fun h => by simpa using symmetric _ h, symmetric x⟩
simp_rw [gauge_def', smul_neg, this]
theorem gauge_neg_set_neg (x : E) : gauge (-s) (-x) = gauge s x := by
simp_rw [gauge_def', smul_neg, neg_mem_neg]
theorem gauge_neg_set_eq_gauge_neg (x : E) : gauge (-s) x = gauge s (-x) := by
rw [← gauge_neg_set_neg, neg_neg]
theorem gauge_le_of_mem (ha : 0 ≤ a) (hx : x ∈ a • s) : gauge s x ≤ a := by
obtain rfl | ha' := ha.eq_or_lt
· rw [mem_singleton_iff.1 (zero_smul_set_subset _ hx), gauge_zero]
· exact csInf_le gauge_set_bddBelow ⟨ha', hx⟩
theorem gauge_le_eq (hs₁ : Convex ℝ s) (hs₀ : (0 : E) ∈ s) (hs₂ : Absorbent ℝ s) (ha : 0 ≤ a) :
{ x | gauge s x ≤ a } = ⋂ (r : ℝ) (_ : a < r), r • s := by
ext x
simp_rw [Set.mem_iInter, Set.mem_setOf_eq]
refine ⟨fun h r hr => ?_, fun h => le_of_forall_pos_lt_add fun ε hε => ?_⟩
· have hr' := ha.trans_lt hr
rw [mem_smul_set_iff_inv_smul_mem₀ hr'.ne']
obtain ⟨δ, δ_pos, hδr, hδ⟩ := exists_lt_of_gauge_lt hs₂ (h.trans_lt hr)
suffices (r⁻¹ * δ) • δ⁻¹ • x ∈ s by rwa [smul_smul, mul_inv_cancel_right₀ δ_pos.ne'] at this
rw [mem_smul_set_iff_inv_smul_mem₀ δ_pos.ne'] at hδ
refine hs₁.smul_mem_of_zero_mem hs₀ hδ ⟨by positivity, ?_⟩
rw [inv_mul_le_iff₀ hr', mul_one]
exact hδr.le
· have hε' := (lt_add_iff_pos_right a).2 (half_pos hε)
exact
(gauge_le_of_mem (ha.trans hε'.le) <| h _ hε').trans_lt (add_lt_add_left (half_lt_self hε) _)
theorem gauge_lt_eq' (absorbs : Absorbent ℝ s) (a : ℝ) :
{ x | gauge s x < a } = ⋃ (r : ℝ) (_ : 0 < r) (_ : r < a), r • s := by
ext
simp_rw [mem_setOf, mem_iUnion, exists_prop]
exact
⟨exists_lt_of_gauge_lt absorbs, fun ⟨r, hr₀, hr₁, hx⟩ =>
(gauge_le_of_mem hr₀.le hx).trans_lt hr₁⟩
theorem gauge_lt_eq (absorbs : Absorbent ℝ s) (a : ℝ) :
{ x | gauge s x < a } = ⋃ r ∈ Set.Ioo 0 (a : ℝ), r • s := by
ext
simp_rw [mem_setOf, mem_iUnion, exists_prop, mem_Ioo, and_assoc]
exact
⟨exists_lt_of_gauge_lt absorbs, fun ⟨r, hr₀, hr₁, hx⟩ =>
(gauge_le_of_mem hr₀.le hx).trans_lt hr₁⟩
theorem mem_openSegment_of_gauge_lt_one (absorbs : Absorbent ℝ s) (hgauge : gauge s x < 1) :
∃ y ∈ s, x ∈ openSegment ℝ 0 y := by
rcases exists_lt_of_gauge_lt absorbs hgauge with ⟨r, hr₀, hr₁, y, hy, rfl⟩
refine ⟨y, hy, 1 - r, r, ?_⟩
simp [*]
theorem gauge_lt_one_subset_self (hs : Convex ℝ s) (h₀ : (0 : E) ∈ s) (absorbs : Absorbent ℝ s) :
{ x | gauge s x < 1 } ⊆ s := fun _x hx ↦
let ⟨_y, hys, hx⟩ := mem_openSegment_of_gauge_lt_one absorbs hx
hs.openSegment_subset h₀ hys hx
theorem gauge_le_one_of_mem {x : E} (hx : x ∈ s) : gauge s x ≤ 1 :=
gauge_le_of_mem zero_le_one <| by rwa [one_smul]
/-- Gauge is subadditive. -/
theorem gauge_add_le (hs : Convex ℝ s) (absorbs : Absorbent ℝ s) (x y : E) :
gauge s (x + y) ≤ gauge s x + gauge s y := by
refine le_of_forall_pos_lt_add fun ε hε => ?_
obtain ⟨a, ha, ha', x, hx, rfl⟩ :=
exists_lt_of_gauge_lt absorbs (lt_add_of_pos_right (gauge s x) (half_pos hε))
obtain ⟨b, hb, hb', y, hy, rfl⟩ :=
exists_lt_of_gauge_lt absorbs (lt_add_of_pos_right (gauge s y) (half_pos hε))
calc
gauge s (a • x + b • y) ≤ a + b := gauge_le_of_mem (by positivity) <| by
rw [hs.add_smul ha.le hb.le]
exact add_mem_add (smul_mem_smul_set hx) (smul_mem_smul_set hy)
_ < gauge s (a • x) + gauge s (b • y) + ε := by linarith
theorem self_subset_gauge_le_one : s ⊆ { x | gauge s x ≤ 1 } := fun _ => gauge_le_one_of_mem
theorem Convex.gauge_le (hs : Convex ℝ s) (h₀ : (0 : E) ∈ s) (absorbs : Absorbent ℝ s) (a : ℝ) :
Convex ℝ { x | gauge s x ≤ a } := by
by_cases ha : 0 ≤ a
· rw [gauge_le_eq hs h₀ absorbs ha]
exact convex_iInter fun i => convex_iInter fun _ => hs.smul _
· convert convex_empty (𝕜 := ℝ)
exact eq_empty_iff_forall_not_mem.2 fun x hx => ha <| (gauge_nonneg _).trans hx
theorem Balanced.starConvex (hs : Balanced ℝ s) : StarConvex ℝ 0 s :=
starConvex_zero_iff.2 fun _ hx a ha₀ ha₁ =>
hs _ (by rwa [Real.norm_of_nonneg ha₀]) (smul_mem_smul_set hx)
theorem le_gauge_of_not_mem (hs₀ : StarConvex ℝ 0 s) (hs₂ : Absorbs ℝ s {x}) (hx : x ∉ a • s) :
a ≤ gauge s x := by
rw [starConvex_zero_iff] at hs₀
obtain ⟨r, hr, h⟩ := hs₂.exists_pos
refine le_csInf ⟨r, hr, singleton_subset_iff.1 <| h _ (Real.norm_of_nonneg hr.le).ge⟩ ?_
rintro b ⟨hb, x, hx', rfl⟩
refine not_lt.1 fun hba => hx ?_
have ha := hb.trans hba
refine ⟨(a⁻¹ * b) • x, hs₀ hx' (by positivity) ?_, ?_⟩
· rw [← div_eq_inv_mul]
exact div_le_one_of_le₀ hba.le ha.le
· dsimp only
rw [← mul_smul, mul_inv_cancel_left₀ ha.ne']
theorem one_le_gauge_of_not_mem (hs₁ : StarConvex ℝ 0 s) (hs₂ : Absorbs ℝ s {x}) (hx : x ∉ s) :
1 ≤ gauge s x :=
le_gauge_of_not_mem hs₁ hs₂ <| by rwa [one_smul]
section LinearOrderedField
variable {α : Type*} [Field α] [LinearOrder α] [IsStrictOrderedRing α]
[MulActionWithZero α ℝ] [OrderedSMul α ℝ]
theorem gauge_smul_of_nonneg [MulActionWithZero α E] [IsScalarTower α ℝ (Set E)] {s : Set E} {a : α}
(ha : 0 ≤ a) (x : E) : gauge s (a • x) = a • gauge s x := by
obtain rfl | ha' := ha.eq_or_lt
· rw [zero_smul, gauge_zero, zero_smul]
rw [gauge_def', gauge_def', ← Real.sInf_smul_of_nonneg ha]
congr 1
ext r
simp_rw [Set.mem_smul_set, Set.mem_sep_iff]
constructor
· rintro ⟨hr, hx⟩
simp_rw [mem_Ioi] at hr ⊢
rw [← mem_smul_set_iff_inv_smul_mem₀ hr.ne'] at hx
have := smul_pos (inv_pos.2 ha') hr
refine ⟨a⁻¹ • r, ⟨this, ?_⟩, smul_inv_smul₀ ha'.ne' _⟩
rwa [← mem_smul_set_iff_inv_smul_mem₀ this.ne', smul_assoc,
mem_smul_set_iff_inv_smul_mem₀ (inv_ne_zero ha'.ne'), inv_inv]
· rintro ⟨r, ⟨hr, hx⟩, rfl⟩
rw [mem_Ioi] at hr ⊢
rw [← mem_smul_set_iff_inv_smul_mem₀ hr.ne'] at hx
| have := smul_pos ha' hr
refine ⟨this, ?_⟩
rw [← mem_smul_set_iff_inv_smul_mem₀ this.ne', smul_assoc]
| Mathlib/Analysis/Convex/Gauge.lean | 248 | 250 |
/-
Copyright (c) 2023 Jz Pan. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Jz Pan
-/
import Mathlib.FieldTheory.SplittingField.Construction
import Mathlib.FieldTheory.IsAlgClosed.AlgebraicClosure
import Mathlib.FieldTheory.Separable
import Mathlib.FieldTheory.Normal.Closure
import Mathlib.RingTheory.AlgebraicIndependent.Adjoin
import Mathlib.RingTheory.AlgebraicIndependent.TranscendenceBasis
import Mathlib.RingTheory.Polynomial.SeparableDegree
import Mathlib.RingTheory.Polynomial.UniqueFactorization
/-!
# Separable degree
This file contains basics about the separable degree of a field extension.
## Main definitions
- `Field.Emb F E`: the type of `F`-algebra homomorphisms from `E` to the algebraic closure of `E`
(the algebraic closure of `F` is usually used in the literature, but our definition has the
advantage that `Field.Emb F E` lies in the same universe as `E` rather than the maximum over `F`
and `E`). Usually denoted by $\operatorname{Emb}_F(E)$ in textbooks.
- `Field.finSepDegree F E`: the (finite) separable degree $[E:F]_s$ of an extension `E / F`
of fields, defined to be the number of `F`-algebra homomorphisms from `E` to the algebraic
closure of `E`, as a natural number. It is zero if `Field.Emb F E` is not finite.
Note that if `E / F` is not algebraic, then this definition makes no mathematical sense.
**Remark:** the `Cardinal`-valued, potentially infinite separable degree `Field.sepDegree F E`
for a general algebraic extension `E / F` is defined to be the degree of `L / F`, where `L` is
the separable closure of `F` in `E`, which is not defined in this file yet. Later we
will show that (`Field.finSepDegree_eq`), if `Field.Emb F E` is finite, then these two
definitions coincide. If `E / F` is algebraic with infinite separable degree, we have
`#(Field.Emb F E) = 2 ^ Field.sepDegree F E` instead.
(See `Field.Emb.cardinal_eq_two_pow_sepDegree` in another file.) For example, if
$F = \mathbb{Q}$ and $E = \mathbb{Q}( \mu_{p^\infty} )$, then $\operatorname{Emb}_F (E)$
is in bijection with $\operatorname{Gal}(E/F)$, which is isomorphic to
$\mathbb{Z}_p^\times$, which is uncountable, whereas $ [E:F] $ is countable.
- `Polynomial.natSepDegree`: the separable degree of a polynomial is a natural number,
defined to be the number of distinct roots of it over its splitting field.
## Main results
- `Field.embEquivOfEquiv`, `Field.finSepDegree_eq_of_equiv`:
a random bijection between `Field.Emb F E` and `Field.Emb F K` when `E` and `K` are isomorphic
as `F`-algebras. In particular, they have the same cardinality (so their
`Field.finSepDegree` are equal).
- `Field.embEquivOfAdjoinSplits`,
`Field.finSepDegree_eq_of_adjoin_splits`: a random bijection between `Field.Emb F E` and
`E →ₐ[F] K` if `E = F(S)` such that every element `s` of `S` is integral (= algebraic) over `F`
and whose minimal polynomial splits in `K`. In particular, they have the same cardinality.
- `Field.embEquivOfIsAlgClosed`,
`Field.finSepDegree_eq_of_isAlgClosed`: a random bijection between `Field.Emb F E` and
`E →ₐ[F] K` when `E / F` is algebraic and `K / F` is algebraically closed.
In particular, they have the same cardinality.
- `Field.embProdEmbOfIsAlgebraic`, `Field.finSepDegree_mul_finSepDegree_of_isAlgebraic`:
if `K / E / F` is a field extension tower, such that `K / E` is algebraic,
then there is a non-canonical bijection `Field.Emb F E × Field.Emb E K ≃ Field.Emb F K`.
In particular, the separable degrees satisfy the tower law: $[E:F]_s [K:E]_s = [K:F]_s$
(see also `Module.finrank_mul_finrank`).
- `Field.infinite_emb_of_transcendental`: `Field.Emb` is infinite for transcendental extensions.
- `Polynomial.natSepDegree_le_natDegree`: the separable degree of a polynomial is smaller than
its degree.
- `Polynomial.natSepDegree_eq_natDegree_iff`: the separable degree of a non-zero polynomial is
equal to its degree if and only if it is separable.
- `Polynomial.natSepDegree_eq_of_splits`: if a polynomial splits over `E`, then its separable degree
is equal to the number of distinct roots of it over `E`.
- `Polynomial.natSepDegree_eq_of_isAlgClosed`: the separable degree of a polynomial is equal to
the number of distinct roots of it over any algebraically closed field.
- `Polynomial.natSepDegree_expand`: if a field `F` is of exponential characteristic
`q`, then `Polynomial.expand F (q ^ n) f` and `f` have the same separable degree.
- `Polynomial.HasSeparableContraction.natSepDegree_eq`: if a polynomial has separable
contraction, then its separable degree is equal to its separable contraction degree.
- `Irreducible.natSepDegree_dvd_natDegree`: the separable degree of an irreducible
polynomial divides its degree.
- `IntermediateField.finSepDegree_adjoin_simple_eq_natSepDegree`: the separable degree of
`F⟮α⟯ / F` is equal to the separable degree of the minimal polynomial of `α` over `F`.
- `IntermediateField.finSepDegree_adjoin_simple_eq_finrank_iff`: if `α` is algebraic over `F`, then
the separable degree of `F⟮α⟯ / F` is equal to the degree of `F⟮α⟯ / F` if and only if `α` is a
separable element.
- `Field.finSepDegree_dvd_finrank`: the separable degree of any field extension `E / F` divides
the degree of `E / F`.
- `Field.finSepDegree_le_finrank`: the separable degree of a finite extension `E / F` is smaller
than the degree of `E / F`.
- `Field.finSepDegree_eq_finrank_iff`: if `E / F` is a finite extension, then its separable degree
is equal to its degree if and only if it is a separable extension.
- `IntermediateField.isSeparable_adjoin_simple_iff_isSeparable`: `F⟮x⟯ / F` is a separable extension
if and only if `x` is a separable element.
- `Algebra.IsSeparable.trans`: if `E / F` and `K / E` are both separable, then `K / F` is also
separable.
## Tags
separable degree, degree, polynomial
-/
open Module Polynomial IntermediateField Field
noncomputable section
universe u v w
variable (F : Type u) (E : Type v) [Field F] [Field E] [Algebra F E]
variable (K : Type w) [Field K] [Algebra F K]
namespace Field
/-- `Field.Emb F E` is the type of `F`-algebra homomorphisms from `E` to the algebraic closure
of `E`. -/
abbrev Emb := E →ₐ[F] AlgebraicClosure E
/-- If `E / F` is an algebraic extension, then the (finite) separable degree of `E / F`
is the number of `F`-algebra homomorphisms from `E` to the algebraic closure of `E`,
as a natural number. It is defined to be zero if there are infinitely many of them.
Note that if `E / F` is not algebraic, then this definition makes no mathematical sense. -/
def finSepDegree : ℕ := Nat.card (Emb F E)
instance instInhabitedEmb : Inhabited (Emb F E) := ⟨IsScalarTower.toAlgHom F E _⟩
instance instNeZeroFinSepDegree [FiniteDimensional F E] : NeZero (finSepDegree F E) :=
⟨Nat.card_ne_zero.2 ⟨inferInstance, Fintype.finite <| minpoly.AlgHom.fintype _ _ _⟩⟩
/-- A random bijection between `Field.Emb F E` and `Field.Emb F K` when `E` and `K` are isomorphic
as `F`-algebras. -/
def embEquivOfEquiv (i : E ≃ₐ[F] K) :
Emb F E ≃ Emb F K := AlgEquiv.arrowCongr i <| AlgEquiv.symm <| by
let _ : Algebra E K := i.toAlgHom.toRingHom.toAlgebra
have : Algebra.IsAlgebraic E K := by
constructor
intro x
have h := isAlgebraic_algebraMap (R := E) (A := K) (i.symm.toAlgHom x)
rw [show ∀ y : E, (algebraMap E K) y = i.toAlgHom y from fun y ↦ rfl] at h
simpa only [AlgEquiv.toAlgHom_eq_coe, AlgHom.coe_coe, AlgEquiv.apply_symm_apply] using h
apply AlgEquiv.restrictScalars (R := F) (S := E)
exact IsAlgClosure.equivOfAlgebraic E K (AlgebraicClosure K) (AlgebraicClosure E)
/-- If `E` and `K` are isomorphic as `F`-algebras, then they have the same `Field.finSepDegree`
over `F`. -/
theorem finSepDegree_eq_of_equiv (i : E ≃ₐ[F] K) :
finSepDegree F E = finSepDegree F K := Nat.card_congr (embEquivOfEquiv F E K i)
@[simp]
theorem finSepDegree_self : finSepDegree F F = 1 := by
have : Cardinal.mk (Emb F F) = 1 := le_antisymm
(Cardinal.le_one_iff_subsingleton.2 AlgHom.subsingleton)
(Cardinal.one_le_iff_ne_zero.2 <| Cardinal.mk_ne_zero _)
rw [finSepDegree, Nat.card, this, Cardinal.one_toNat]
end Field
namespace IntermediateField
@[simp]
theorem finSepDegree_bot : finSepDegree F (⊥ : IntermediateField F E) = 1 := by
rw [finSepDegree_eq_of_equiv _ _ _ (botEquiv F E), finSepDegree_self]
section Tower
variable {F}
variable [Algebra E K] [IsScalarTower F E K]
@[simp]
theorem finSepDegree_bot' : finSepDegree F (⊥ : IntermediateField E K) = finSepDegree F E :=
finSepDegree_eq_of_equiv _ _ _ ((botEquiv E K).restrictScalars F)
@[simp]
theorem finSepDegree_top : finSepDegree F (⊤ : IntermediateField E K) = finSepDegree F K :=
finSepDegree_eq_of_equiv _ _ _ ((topEquiv (F := E) (E := K)).restrictScalars F)
end Tower
end IntermediateField
namespace Field
/-- A random bijection between `Field.Emb F E` and `E →ₐ[F] K` if `E = F(S)` such that every
element `s` of `S` is integral (= algebraic) over `F` and whose minimal polynomial splits in `K`.
Combined with `Field.instInhabitedEmb`, it can be viewed as a stronger version of
`IntermediateField.nonempty_algHom_of_adjoin_splits`. -/
def embEquivOfAdjoinSplits {S : Set E} (hS : adjoin F S = ⊤)
(hK : ∀ s ∈ S, IsIntegral F s ∧ Splits (algebraMap F K) (minpoly F s)) :
Emb F E ≃ (E →ₐ[F] K) :=
have : Algebra.IsAlgebraic F (⊤ : IntermediateField F E) :=
(hS ▸ isAlgebraic_adjoin (S := S) fun x hx ↦ (hK x hx).1)
have halg := (topEquiv (F := F) (E := E)).isAlgebraic
Classical.choice <| Function.Embedding.antisymm
(halg.algHomEmbeddingOfSplits (fun _ ↦ splits_of_mem_adjoin F E (S := S) hK (hS ▸ mem_top)) _)
(halg.algHomEmbeddingOfSplits (fun _ ↦ IsAlgClosed.splits_codomain _) _)
/-- The `Field.finSepDegree F E` is equal to the cardinality of `E →ₐ[F] K`
if `E = F(S)` such that every element
`s` of `S` is integral (= algebraic) over `F` and whose minimal polynomial splits in `K`. -/
theorem finSepDegree_eq_of_adjoin_splits {S : Set E} (hS : adjoin F S = ⊤)
(hK : ∀ s ∈ S, IsIntegral F s ∧ Splits (algebraMap F K) (minpoly F s)) :
finSepDegree F E = Nat.card (E →ₐ[F] K) := Nat.card_congr (embEquivOfAdjoinSplits F E K hS hK)
/-- A random bijection between `Field.Emb F E` and `E →ₐ[F] K` when `E / F` is algebraic
and `K / F` is algebraically closed. -/
def embEquivOfIsAlgClosed [Algebra.IsAlgebraic F E] [IsAlgClosed K] :
Emb F E ≃ (E →ₐ[F] K) :=
embEquivOfAdjoinSplits F E K (adjoin_univ F E) fun s _ ↦
⟨Algebra.IsIntegral.isIntegral s, IsAlgClosed.splits_codomain _⟩
/-- The `Field.finSepDegree F E` is equal to the cardinality of `E →ₐ[F] K` as a natural number,
when `E / F` is algebraic and `K / F` is algebraically closed. -/
@[stacks 09HJ "We use `finSepDegree` to state a more general result."]
theorem finSepDegree_eq_of_isAlgClosed [Algebra.IsAlgebraic F E] [IsAlgClosed K] :
finSepDegree F E = Nat.card (E →ₐ[F] K) := Nat.card_congr (embEquivOfIsAlgClosed F E K)
/-- If `K / E / F` is a field extension tower, such that `K / E` is algebraic,
then there is a non-canonical bijection
`Field.Emb F E × Field.Emb E K ≃ Field.Emb F K`. A corollary of `algHomEquivSigma`. -/
def embProdEmbOfIsAlgebraic [Algebra E K] [IsScalarTower F E K] [Algebra.IsAlgebraic E K] :
Emb F E × Emb E K ≃ Emb F K :=
let e : ∀ f : E →ₐ[F] AlgebraicClosure K,
@AlgHom E K _ _ _ _ _ f.toRingHom.toAlgebra ≃ Emb E K := fun f ↦
(@embEquivOfIsAlgClosed E K _ _ _ _ _ f.toRingHom.toAlgebra).symm
(algHomEquivSigma (A := F) (B := E) (C := K) (D := AlgebraicClosure K) |>.trans
(Equiv.sigmaEquivProdOfEquiv e) |>.trans <| Equiv.prodCongrLeft <|
fun _ : Emb E K ↦ AlgEquiv.arrowCongr (@AlgEquiv.refl F E _ _ _) <|
(IsAlgClosure.equivOfAlgebraic E K (AlgebraicClosure K)
(AlgebraicClosure E)).restrictScalars F).symm
/-- If the field extension `E / F` is transcendental, then `Field.Emb F E` is infinite. -/
instance infinite_emb_of_transcendental [H : Algebra.Transcendental F E] : Infinite (Emb F E) := by
obtain ⟨ι, x, hx⟩ := exists_isTranscendenceBasis' F E
have := hx.isAlgebraic_field
rw [← (embProdEmbOfIsAlgebraic F (adjoin F (Set.range x)) E).infinite_iff]
refine @Prod.infinite_of_left _ _ ?_ _
rw [← (embEquivOfEquiv _ _ _ hx.1.aevalEquivField).infinite_iff]
obtain ⟨i⟩ := hx.nonempty_iff_transcendental.2 H
let K := FractionRing (MvPolynomial ι F)
let i1 := IsScalarTower.toAlgHom F (MvPolynomial ι F) (AlgebraicClosure K)
have hi1 : Function.Injective i1 := by
rw [IsScalarTower.coe_toAlgHom', IsScalarTower.algebraMap_eq _ K]
exact (algebraMap K (AlgebraicClosure K)).injective.comp (IsFractionRing.injective _ _)
let f (n : ℕ) : Emb F K := IsFractionRing.liftAlgHom
(g := i1.comp <| MvPolynomial.aeval fun i : ι ↦ MvPolynomial.X i ^ (n + 1)) <| hi1.comp <| by
simpa [algebraicIndependent_iff_injective_aeval] using
MvPolynomial.algebraicIndependent_polynomial_aeval_X _
fun i : ι ↦ (Polynomial.transcendental_X F).pow n.succ_pos
refine Infinite.of_injective f fun m n h ↦ ?_
replace h : (MvPolynomial.X i) ^ (m + 1) = (MvPolynomial.X i) ^ (n + 1) := hi1 <| by
simpa [f, -map_pow] using congr($h (algebraMap _ K (MvPolynomial.X (R := F) i)))
simpa using congr(MvPolynomial.totalDegree $h)
/-- If the field extension `E / F` is transcendental, then `Field.finSepDegree F E = 0`, which
actually means that `Field.Emb F E` is infinite (see `Field.infinite_emb_of_transcendental`). -/
theorem finSepDegree_eq_zero_of_transcendental [Algebra.Transcendental F E] :
finSepDegree F E = 0 := Nat.card_eq_zero_of_infinite
/-- If `K / E / F` is a field extension tower, such that `K / E` is algebraic, then their
separable degrees satisfy the tower law
$[E:F]_s [K:E]_s = [K:F]_s$. See also `Module.finrank_mul_finrank`. -/
@[stacks 09HK "Part 1, `finSepDegree` variant"]
theorem finSepDegree_mul_finSepDegree_of_isAlgebraic
[Algebra E K] [IsScalarTower F E K] [Algebra.IsAlgebraic E K] :
finSepDegree F E * finSepDegree E K = finSepDegree F K := by
simpa only [Nat.card_prod] using Nat.card_congr (embProdEmbOfIsAlgebraic F E K)
end Field
namespace Polynomial
variable {F E}
variable (f : F[X])
open Classical in
/-- The separable degree `Polynomial.natSepDegree` of a polynomial is a natural number,
defined to be the number of distinct roots of it over its splitting field.
This is similar to `Polynomial.natDegree` but not to `Polynomial.degree`, namely, the separable
degree of `0` is `0`, not negative infinity. -/
def natSepDegree : ℕ := (f.aroots f.SplittingField).toFinset.card
/-- The separable degree of a polynomial is smaller than its degree. -/
theorem natSepDegree_le_natDegree : f.natSepDegree ≤ f.natDegree := by
have := f.map (algebraMap F f.SplittingField) |>.card_roots'
rw [← aroots_def, natDegree_map] at this
classical
exact (f.aroots f.SplittingField).toFinset_card_le.trans this
@[simp]
theorem natSepDegree_X_sub_C (x : F) : (X - C x).natSepDegree = 1 := by
simp only [natSepDegree, aroots_X_sub_C, Multiset.toFinset_singleton, Finset.card_singleton]
@[simp]
theorem natSepDegree_X : (X : F[X]).natSepDegree = 1 := by
simp only [natSepDegree, aroots_X, Multiset.toFinset_singleton, Finset.card_singleton]
/-- A constant polynomial has zero separable degree. -/
theorem natSepDegree_eq_zero (h : f.natDegree = 0) : f.natSepDegree = 0 := by
linarith only [natSepDegree_le_natDegree f, h]
@[simp]
theorem natSepDegree_C (x : F) : (C x).natSepDegree = 0 := natSepDegree_eq_zero _ (natDegree_C _)
@[simp]
theorem natSepDegree_zero : (0 : F[X]).natSepDegree = 0 := by
rw [← C_0, natSepDegree_C]
@[simp]
theorem natSepDegree_one : (1 : F[X]).natSepDegree = 0 := by
rw [← C_1, natSepDegree_C]
/-- A non-constant polynomial has non-zero separable degree. -/
theorem natSepDegree_ne_zero (h : f.natDegree ≠ 0) : f.natSepDegree ≠ 0 := by
rw [natSepDegree, ne_eq, Finset.card_eq_zero, ← ne_eq, ← Finset.nonempty_iff_ne_empty]
use rootOfSplits _ (SplittingField.splits f) (ne_of_apply_ne _ h)
classical
rw [Multiset.mem_toFinset, mem_aroots]
exact ⟨ne_of_apply_ne _ h, map_rootOfSplits _ (SplittingField.splits f) (ne_of_apply_ne _ h)⟩
/-- A polynomial has zero separable degree if and only if it is constant. -/
theorem natSepDegree_eq_zero_iff : f.natSepDegree = 0 ↔ f.natDegree = 0 :=
⟨(natSepDegree_ne_zero f).mtr, natSepDegree_eq_zero f⟩
/-- A polynomial has non-zero separable degree if and only if it is non-constant. -/
theorem natSepDegree_ne_zero_iff : f.natSepDegree ≠ 0 ↔ f.natDegree ≠ 0 :=
Iff.not <| natSepDegree_eq_zero_iff f
/-- The separable degree of a non-zero polynomial is equal to its degree if and only if
it is separable. -/
theorem natSepDegree_eq_natDegree_iff (hf : f ≠ 0) :
f.natSepDegree = f.natDegree ↔ f.Separable := by
classical
simp_rw [← card_rootSet_eq_natDegree_iff_of_splits hf (SplittingField.splits f),
rootSet_def, Finset.coe_sort_coe, Fintype.card_coe]
rfl
/-- If a polynomial is separable, then its separable degree is equal to its degree. -/
theorem natSepDegree_eq_natDegree_of_separable (h : f.Separable) :
f.natSepDegree = f.natDegree := (natSepDegree_eq_natDegree_iff f h.ne_zero).2 h
variable {f} in
/-- Same as `Polynomial.natSepDegree_eq_natDegree_of_separable`, but enables the use of
dot notation. -/
theorem Separable.natSepDegree_eq_natDegree (h : f.Separable) :
f.natSepDegree = f.natDegree := natSepDegree_eq_natDegree_of_separable f h
/-- If a polynomial splits over `E`, then its separable degree is equal to
the number of distinct roots of it over `E`. -/
theorem natSepDegree_eq_of_splits [DecidableEq E] (h : f.Splits (algebraMap F E)) :
f.natSepDegree = (f.aroots E).toFinset.card := by
classical
rw [aroots, ← (SplittingField.lift f h).comp_algebraMap, ← map_map,
roots_map _ ((splits_id_iff_splits _).mpr <| SplittingField.splits f),
Multiset.toFinset_map, Finset.card_image_of_injective _ (RingHom.injective _), natSepDegree]
variable (E) in
/-- The separable degree of a polynomial is equal to
the number of distinct roots of it over any algebraically closed field. -/
theorem natSepDegree_eq_of_isAlgClosed [DecidableEq E] [IsAlgClosed E] :
f.natSepDegree = (f.aroots E).toFinset.card :=
natSepDegree_eq_of_splits f (IsAlgClosed.splits_codomain f)
theorem natSepDegree_map (f : E[X]) (i : E →+* K) : (f.map i).natSepDegree = f.natSepDegree := by
classical
let _ := i.toAlgebra
simp_rw [show i = algebraMap E K by rfl, natSepDegree_eq_of_isAlgClosed (AlgebraicClosure K),
aroots_def, map_map, ← IsScalarTower.algebraMap_eq]
@[simp]
theorem natSepDegree_C_mul {x : F} (hx : x ≠ 0) :
(C x * f).natSepDegree = f.natSepDegree := by
classical
simp only [natSepDegree_eq_of_isAlgClosed (AlgebraicClosure F), aroots_C_mul _ hx]
@[simp]
theorem natSepDegree_smul_nonzero {x : F} (hx : x ≠ 0) :
(x • f).natSepDegree = f.natSepDegree := by
classical
simp only [natSepDegree_eq_of_isAlgClosed (AlgebraicClosure F), aroots_smul_nonzero _ hx]
@[simp]
theorem natSepDegree_pow {n : ℕ} : (f ^ n).natSepDegree = if n = 0 then 0 else f.natSepDegree := by
classical
simp only [natSepDegree_eq_of_isAlgClosed (AlgebraicClosure F), aroots_pow]
by_cases h : n = 0
· simp only [h, zero_smul, Multiset.toFinset_zero, Finset.card_empty, ite_true]
simp only [h, Multiset.toFinset_nsmul _ n h, ite_false]
theorem natSepDegree_pow_of_ne_zero {n : ℕ} (hn : n ≠ 0) :
(f ^ n).natSepDegree = f.natSepDegree := by simp_rw [natSepDegree_pow, hn, ite_false]
theorem natSepDegree_X_pow {n : ℕ} : (X ^ n : F[X]).natSepDegree = if n = 0 then 0 else 1 := by
simp only [natSepDegree_pow, natSepDegree_X]
theorem natSepDegree_X_sub_C_pow {x : F} {n : ℕ} :
((X - C x) ^ n).natSepDegree = if n = 0 then 0 else 1 := by
simp only [natSepDegree_pow, natSepDegree_X_sub_C]
theorem natSepDegree_C_mul_X_sub_C_pow {x y : F} {n : ℕ} (hx : x ≠ 0) :
(C x * (X - C y) ^ n).natSepDegree = if n = 0 then 0 else 1 := by
simp only [natSepDegree_C_mul _ hx, natSepDegree_X_sub_C_pow]
theorem natSepDegree_mul (g : F[X]) :
(f * g).natSepDegree ≤ f.natSepDegree + g.natSepDegree := by
by_cases h : f * g = 0
· simp only [h, natSepDegree_zero, zero_le]
classical
simp_rw [natSepDegree_eq_of_isAlgClosed (AlgebraicClosure F), aroots_mul h, Multiset.toFinset_add]
exact Finset.card_union_le _ _
theorem natSepDegree_mul_eq_iff (g : F[X]) :
(f * g).natSepDegree = f.natSepDegree + g.natSepDegree ↔ (f = 0 ∧ g = 0) ∨ IsCoprime f g := by
by_cases h : f * g = 0
· rw [mul_eq_zero] at h
wlog hf : f = 0 generalizing f g
· simpa only [mul_comm, add_comm, and_comm,
isCoprime_comm] using this g f h.symm (h.resolve_left hf)
rw [hf, zero_mul, natSepDegree_zero, zero_add, isCoprime_zero_left, isUnit_iff, eq_comm,
natSepDegree_eq_zero_iff, natDegree_eq_zero]
refine ⟨fun ⟨x, h⟩ ↦ ?_, ?_⟩
· by_cases hx : x = 0
· exact .inl ⟨rfl, by rw [← h, hx, map_zero]⟩
exact .inr ⟨x, Ne.isUnit hx, h⟩
rintro (⟨-, h⟩ | ⟨x, -, h⟩)
· exact ⟨0, by rw [h, map_zero]⟩
exact ⟨x, h⟩
classical
simp_rw [natSepDegree_eq_of_isAlgClosed (AlgebraicClosure F), aroots_mul h, Multiset.toFinset_add,
Finset.card_union_eq_card_add_card, Finset.disjoint_iff_ne, Multiset.mem_toFinset, mem_aroots]
rw [mul_eq_zero, not_or] at h
refine ⟨fun H ↦ .inr (isCoprime_of_irreducible_dvd (not_and.2 fun _ ↦ h.2)
fun u hu ⟨v, hf⟩ ⟨w, hg⟩ ↦ ?_), ?_⟩
· obtain ⟨x, hx⟩ := IsAlgClosed.exists_aeval_eq_zero
(AlgebraicClosure F) _ (degree_pos_of_irreducible hu).ne'
exact H x ⟨h.1, by simpa only [map_mul, hx, zero_mul] using congr(aeval x $hf)⟩
x ⟨h.2, by simpa only [map_mul, hx, zero_mul] using congr(aeval x $hg)⟩ rfl
rintro (⟨rfl, rfl⟩ | hc)
· exact (h.1 rfl).elim
rintro x hf _ hg rfl
obtain ⟨u, v, hfg⟩ := hc
simpa only [map_add, map_mul, map_one, hf.2, hg.2, mul_zero, add_zero,
zero_ne_one] using congr(aeval x $hfg)
theorem natSepDegree_mul_of_isCoprime (g : F[X]) (hc : IsCoprime f g) :
(f * g).natSepDegree = f.natSepDegree + g.natSepDegree :=
(natSepDegree_mul_eq_iff f g).2 (.inr hc)
theorem natSepDegree_le_of_dvd (g : F[X]) (h1 : f ∣ g) (h2 : g ≠ 0) :
f.natSepDegree ≤ g.natSepDegree := by
classical
simp_rw [natSepDegree_eq_of_isAlgClosed (AlgebraicClosure F)]
exact Finset.card_le_card <| Multiset.toFinset_subset.mpr <|
Multiset.Le.subset <| roots.le_of_dvd (map_ne_zero h2) <| map_dvd _ h1
/-- If a field `F` is of exponential characteristic `q`, then `Polynomial.expand F (q ^ n) f`
and `f` have the same separable degree. -/
theorem natSepDegree_expand (q : ℕ) [hF : ExpChar F q] {n : ℕ} :
(expand F (q ^ n) f).natSepDegree = f.natSepDegree := by
obtain - | hprime := hF
· simp only [one_pow, expand_one]
haveI := Fact.mk hprime
classical
simpa only [natSepDegree_eq_of_isAlgClosed (AlgebraicClosure F), aroots_def, map_expand,
Fintype.card_coe] using Fintype.card_eq.2
⟨(f.map (algebraMap F (AlgebraicClosure F))).rootsExpandPowEquivRoots q n⟩
theorem natSepDegree_X_pow_char_pow_sub_C (q : ℕ) [ExpChar F q] (n : ℕ) (y : F) :
(X ^ q ^ n - C y).natSepDegree = 1 := by
rw [← expand_X, ← expand_C (q ^ n), ← map_sub, natSepDegree_expand, natSepDegree_X_sub_C]
variable {f} in
/-- If `g` is a separable contraction of `f`, then the separable degree of `f` is equal to
the degree of `g`. -/
theorem IsSeparableContraction.natSepDegree_eq {g : Polynomial F} {q : ℕ} [ExpChar F q]
(h : IsSeparableContraction q f g) : f.natSepDegree = g.natDegree := by
obtain ⟨h1, m, h2⟩ := h
rw [← h2, natSepDegree_expand, h1.natSepDegree_eq_natDegree]
variable {f} in
/-- If a polynomial has separable contraction, then its separable degree is equal to the degree of
the given separable contraction. -/
theorem HasSeparableContraction.natSepDegree_eq
{q : ℕ} [ExpChar F q] (hf : f.HasSeparableContraction q) :
f.natSepDegree = hf.degree := hf.isSeparableContraction.natSepDegree_eq
end Polynomial
namespace Irreducible
variable {F}
variable {f : F[X]}
/-- The separable degree of an irreducible polynomial divides its degree. -/
theorem natSepDegree_dvd_natDegree (h : Irreducible f) :
f.natSepDegree ∣ f.natDegree := by
obtain ⟨q, _⟩ := ExpChar.exists F
have hf := h.hasSeparableContraction q
rw [hf.natSepDegree_eq]
exact hf.dvd_degree
/-- A monic irreducible polynomial over a field `F` of exponential characteristic `q` has
separable degree one if and only if it is of the form `Polynomial.expand F (q ^ n) (X - C y)`
for some `n : ℕ` and `y : F`. -/
theorem natSepDegree_eq_one_iff_of_monic' (q : ℕ) [ExpChar F q] (hm : f.Monic)
(hi : Irreducible f) : f.natSepDegree = 1 ↔
∃ (n : ℕ) (y : F), f = expand F (q ^ n) (X - C y) := by
refine ⟨fun h ↦ ?_, fun ⟨n, y, h⟩ ↦ ?_⟩
· obtain ⟨g, h1, n, rfl⟩ := hi.hasSeparableContraction q
have h2 : g.natDegree = 1 := by
rwa [natSepDegree_expand _ q, h1.natSepDegree_eq_natDegree] at h
rw [((monic_expand_iff <| expChar_pow_pos F q n).mp hm).eq_X_add_C h2]
exact ⟨n, -(g.coeff 0), by rw [map_neg, sub_neg_eq_add]⟩
rw [h, natSepDegree_expand _ q, natSepDegree_X_sub_C]
/-- A monic irreducible polynomial over a field `F` of exponential characteristic `q` has
separable degree one if and only if it is of the form `X ^ (q ^ n) - C y`
for some `n : ℕ` and `y : F`. -/
theorem natSepDegree_eq_one_iff_of_monic (q : ℕ) [ExpChar F q] (hm : f.Monic)
(hi : Irreducible f) : f.natSepDegree = 1 ↔ ∃ (n : ℕ) (y : F), f = X ^ q ^ n - C y := by
simp_rw [hi.natSepDegree_eq_one_iff_of_monic' q hm, map_sub, expand_X, expand_C]
end Irreducible
namespace Polynomial
namespace Monic
variable {F}
variable {f : F[X]}
alias natSepDegree_eq_one_iff_of_irreducible' := Irreducible.natSepDegree_eq_one_iff_of_monic'
alias natSepDegree_eq_one_iff_of_irreducible := Irreducible.natSepDegree_eq_one_iff_of_monic
/-- If a monic polynomial of separable degree one splits, then it is of form `(X - C y) ^ m` for
some non-zero natural number `m` and some element `y` of `F`. -/
theorem eq_X_sub_C_pow_of_natSepDegree_eq_one_of_splits (hm : f.Monic)
(hs : f.Splits (RingHom.id F))
(h : f.natSepDegree = 1) : ∃ (m : ℕ) (y : F), m ≠ 0 ∧ f = (X - C y) ^ m := by
classical
have h1 := eq_prod_roots_of_monic_of_splits_id hm hs
have h2 := (natSepDegree_eq_of_splits f hs).symm
rw [h, aroots_def, Algebra.id.map_eq_id, map_id, Multiset.toFinset_card_eq_one_iff] at h2
obtain ⟨h2, y, h3⟩ := h2
exact ⟨_, y, h2, by rwa [h3, Multiset.map_nsmul, Multiset.map_singleton, Multiset.prod_nsmul,
Multiset.prod_singleton] at h1⟩
/-- If a monic irreducible polynomial over a field `F` of exponential characteristic `q` has
separable degree one, then it is of the form `X ^ (q ^ n) - C y` for some natural number `n`,
and some element `y` of `F`, such that either `n = 0` or `y` has no `q`-th root in `F`. -/
theorem eq_X_pow_char_pow_sub_C_of_natSepDegree_eq_one_of_irreducible (q : ℕ) [ExpChar F q]
(hm : f.Monic) (hi : Irreducible f) (h : f.natSepDegree = 1) : ∃ (n : ℕ) (y : F),
(n = 0 ∨ y ∉ (frobenius F q).range) ∧ f = X ^ q ^ n - C y := by
obtain ⟨n, y, hf⟩ := (hm.natSepDegree_eq_one_iff_of_irreducible q hi).1 h
cases id ‹ExpChar F q› with
| zero =>
simp_rw [one_pow, pow_one] at hf ⊢
exact ⟨0, y, .inl rfl, hf⟩
| prime hq =>
refine ⟨n, y, (em _).imp id fun hn ⟨z, hy⟩ ↦ ?_, hf⟩
haveI := expChar_of_injective_ringHom (R := F) C_injective q
rw [hf, ← Nat.succ_pred hn, pow_succ, pow_mul, ← hy, frobenius_def, map_pow,
← sub_pow_expChar] at hi
exact not_irreducible_pow hq.ne_one hi
/-- If a monic polynomial over a field `F` of exponential characteristic `q` has separable degree
one, then it is of the form `(X ^ (q ^ n) - C y) ^ m` for some non-zero natural number `m`,
some natural number `n`, and some element `y` of `F`, such that either `n = 0` or `y` has no
`q`-th root in `F`. -/
theorem eq_X_pow_char_pow_sub_C_pow_of_natSepDegree_eq_one (q : ℕ) [ExpChar F q] (hm : f.Monic)
(h : f.natSepDegree = 1) : ∃ (m n : ℕ) (y : F),
m ≠ 0 ∧ (n = 0 ∨ y ∉ (frobenius F q).range) ∧ f = (X ^ q ^ n - C y) ^ m := by
obtain ⟨p, hM, hI, hf⟩ := exists_monic_irreducible_factor _ <| not_isUnit_of_natDegree_pos _
<| Nat.pos_of_ne_zero <| (natSepDegree_ne_zero_iff _).1 (h.symm ▸ Nat.one_ne_zero)
have hD := (h ▸ natSepDegree_le_of_dvd p f hf hm.ne_zero).antisymm <|
Nat.pos_of_ne_zero <| (natSepDegree_ne_zero_iff _).2 hI.natDegree_pos.ne'
obtain ⟨n, y, H, hp⟩ := hM.eq_X_pow_char_pow_sub_C_of_natSepDegree_eq_one_of_irreducible q hI hD
have hF := finiteMultiplicity_of_degree_pos_of_monic (degree_pos_of_irreducible hI) hM hm.ne_zero
classical
have hne := (multiplicity_pos_of_dvd hf).ne'
refine ⟨_, n, y, hne, H, ?_⟩
obtain ⟨c, hf, H⟩ := hF.exists_eq_pow_mul_and_not_dvd
rw [hf, natSepDegree_mul_of_isCoprime _ c <| IsCoprime.pow_left <|
(hI.isCoprime_or_dvd c).resolve_right H, natSepDegree_pow_of_ne_zero _ hne, hD,
add_eq_left, natSepDegree_eq_zero_iff] at h
simpa only [eq_one_of_monic_natDegree_zero ((hM.pow _).of_mul_monic_left (hf ▸ hm)) h,
mul_one, ← hp] using hf
/-- A monic polynomial over a field `F` of exponential characteristic `q` has separable degree one
if and only if it is of the form `(X ^ (q ^ n) - C y) ^ m` for some non-zero natural number `m`,
some natural number `n`, and some element `y` of `F`. -/
theorem natSepDegree_eq_one_iff (q : ℕ) [ExpChar F q] (hm : f.Monic) :
f.natSepDegree = 1 ↔ ∃ (m n : ℕ) (y : F), m ≠ 0 ∧ f = (X ^ q ^ n - C y) ^ m := by
refine ⟨fun h ↦ ?_, fun ⟨m, n, y, hm, h⟩ ↦ ?_⟩
· obtain ⟨m, n, y, hm, -, h⟩ := hm.eq_X_pow_char_pow_sub_C_pow_of_natSepDegree_eq_one q h
exact ⟨m, n, y, hm, h⟩
simp_rw [h, natSepDegree_pow, hm, ite_false, natSepDegree_X_pow_char_pow_sub_C]
end Monic
end Polynomial
namespace minpoly
variable {F : Type u} {E : Type v} [Field F] [Ring E] [IsDomain E] [Algebra F E]
variable (q : ℕ) [hF : ExpChar F q] {x : E}
/-- The minimal polynomial of an element of `E / F` of exponential characteristic `q` has
separable degree one if and only if the minimal polynomial is of the form
`Polynomial.expand F (q ^ n) (X - C y)` for some `n : ℕ` and `y : F`. -/
theorem natSepDegree_eq_one_iff_eq_expand_X_sub_C : (minpoly F x).natSepDegree = 1 ↔
∃ (n : ℕ) (y : F), minpoly F x = expand F (q ^ n) (X - C y) := by
refine ⟨fun h ↦ ?_, fun ⟨n, y, h⟩ ↦ ?_⟩
· have halg : IsIntegral F x := by_contra fun h' ↦ by
simp only [eq_zero h', natSepDegree_zero, zero_ne_one] at h
exact (minpoly.irreducible halg).natSepDegree_eq_one_iff_of_monic' q
(minpoly.monic halg) |>.1 h
rw [h, natSepDegree_expand _ q, natSepDegree_X_sub_C]
/-- The minimal polynomial of an element of `E / F` of exponential characteristic `q` has
separable degree one if and only if the minimal polynomial is of the form
`X ^ (q ^ n) - C y` for some `n : ℕ` and `y : F`. -/
theorem natSepDegree_eq_one_iff_eq_X_pow_sub_C : (minpoly F x).natSepDegree = 1 ↔
∃ (n : ℕ) (y : F), minpoly F x = X ^ q ^ n - C y := by
simp only [minpoly.natSepDegree_eq_one_iff_eq_expand_X_sub_C q, map_sub, expand_X, expand_C]
/-- The minimal polynomial of an element `x` of `E / F` of exponential characteristic `q` has
separable degree one if and only if `x ^ (q ^ n) ∈ F` for some `n : ℕ`. -/
theorem natSepDegree_eq_one_iff_pow_mem : (minpoly F x).natSepDegree = 1 ↔
∃ n : ℕ, x ^ q ^ n ∈ (algebraMap F E).range := by
convert_to _ ↔ ∃ (n : ℕ) (y : F), Polynomial.aeval x (X ^ q ^ n - C y) = 0
· simp_rw [RingHom.mem_range, map_sub, map_pow, aeval_C, aeval_X, sub_eq_zero, eq_comm]
refine ⟨fun h ↦ ?_, fun ⟨n, y, h⟩ ↦ ?_⟩
· obtain ⟨n, y, hx⟩ := (minpoly.natSepDegree_eq_one_iff_eq_X_pow_sub_C q).1 h
exact ⟨n, y, hx ▸ aeval F x⟩
have hnezero := X_pow_sub_C_ne_zero (expChar_pow_pos F q n) y
refine ((natSepDegree_le_of_dvd _ _ (minpoly.dvd F x h) hnezero).trans_eq <|
natSepDegree_X_pow_char_pow_sub_C q n y).antisymm ?_
rw [Nat.one_le_iff_ne_zero, natSepDegree_ne_zero_iff, ← Nat.one_le_iff_ne_zero]
exact minpoly.natDegree_pos <| IsAlgebraic.isIntegral ⟨_, hnezero, h⟩
/-- The minimal polynomial of an element `x` of `E / F` of exponential characteristic `q` has
separable degree one if and only if the minimal polynomial is of the form
`(X - x) ^ (q ^ n)` for some `n : ℕ`. -/
theorem natSepDegree_eq_one_iff_eq_X_sub_C_pow : (minpoly F x).natSepDegree = 1 ↔
∃ n : ℕ, (minpoly F x).map (algebraMap F E) = (X - C x) ^ q ^ n := by
haveI := expChar_of_injective_algebraMap (algebraMap F E).injective q
haveI := expChar_of_injective_ringHom (C_injective (R := E)) q
refine ⟨fun h ↦ ?_, fun ⟨n, h⟩ ↦ (natSepDegree_eq_one_iff_pow_mem q).2 ?_⟩
· obtain ⟨n, y, h⟩ := (natSepDegree_eq_one_iff_eq_X_pow_sub_C q).1 h
have hx := congr_arg (Polynomial.aeval x) h.symm
rw [minpoly.aeval, map_sub, map_pow, aeval_X, aeval_C, sub_eq_zero, eq_comm] at hx
use n
rw [h, Polynomial.map_sub, Polynomial.map_pow, map_X, map_C, hx, map_pow,
← sub_pow_expChar_pow_of_commute _ _ (commute_X _)]
apply_fun constantCoeff at h
simp_rw [map_pow, map_sub, constantCoeff_apply, coeff_map, coeff_X_zero, coeff_C_zero] at h
rw [zero_sub, neg_pow, neg_one_pow_expChar_pow] at h
exact ⟨n, -(minpoly F x).coeff 0, by rw [map_neg, h, neg_mul, one_mul, neg_neg]⟩
end minpoly
namespace IntermediateField
/-- The separable degree of `F⟮α⟯ / F` is equal to the separable degree of the
minimal polynomial of `α` over `F`. -/
theorem finSepDegree_adjoin_simple_eq_natSepDegree {α : E} (halg : IsAlgebraic F α) :
finSepDegree F F⟮α⟯ = (minpoly F α).natSepDegree := by
have : finSepDegree F F⟮α⟯ = _ := Nat.card_congr
(algHomAdjoinIntegralEquiv F (K := AlgebraicClosure F⟮α⟯) halg.isIntegral)
classical
rw [this, Nat.card_eq_fintype_card, natSepDegree_eq_of_isAlgClosed (E := AlgebraicClosure F⟮α⟯),
← Fintype.card_coe]
simp_rw [Multiset.mem_toFinset]
-- The separable degree of `F⟮α⟯ / F` divides the degree of `F⟮α⟯ / F`.
-- Marked as `private` because it is a special case of `finSepDegree_dvd_finrank`.
private theorem finSepDegree_adjoin_simple_dvd_finrank (α : E) :
finSepDegree F F⟮α⟯ ∣ finrank F F⟮α⟯ := by
by_cases halg : IsAlgebraic F α
· rw [finSepDegree_adjoin_simple_eq_natSepDegree F E halg, adjoin.finrank halg.isIntegral]
exact (minpoly.irreducible halg.isIntegral).natSepDegree_dvd_natDegree
have : finrank F F⟮α⟯ = 0 := finrank_of_infinite_dimensional fun _ ↦
halg ((AdjoinSimple.isIntegral_gen F α).1 (IsIntegral.of_finite F _)).isAlgebraic
rw [this]
exact dvd_zero _
/-- The separable degree of `F⟮α⟯ / F` is smaller than the degree of `F⟮α⟯ / F` if `α` is
algebraic over `F`. -/
theorem finSepDegree_adjoin_simple_le_finrank (α : E) (halg : IsAlgebraic F α) :
finSepDegree F F⟮α⟯ ≤ finrank F F⟮α⟯ := by
haveI := adjoin.finiteDimensional halg.isIntegral
exact Nat.le_of_dvd finrank_pos <| finSepDegree_adjoin_simple_dvd_finrank F E α
/-- If `α` is algebraic over `F`, then the separable degree of `F⟮α⟯ / F` is equal to the degree
of `F⟮α⟯ / F` if and only if `α` is a separable element. -/
theorem finSepDegree_adjoin_simple_eq_finrank_iff (α : E) (halg : IsAlgebraic F α) :
finSepDegree F F⟮α⟯ = finrank F F⟮α⟯ ↔ IsSeparable F α := by
rw [finSepDegree_adjoin_simple_eq_natSepDegree F E halg, adjoin.finrank halg.isIntegral,
natSepDegree_eq_natDegree_iff _ (minpoly.ne_zero halg.isIntegral), IsSeparable]
end IntermediateField
namespace Field
/-- The separable degree of any field extension `E / F` divides the degree of `E / F`. -/
theorem finSepDegree_dvd_finrank : finSepDegree F E ∣ finrank F E := by
by_cases hfd : FiniteDimensional F E
· rw [← finSepDegree_top F, ← finrank_top F E]
refine induction_on_adjoin (fun K : IntermediateField F E ↦ finSepDegree F K ∣ finrank F K)
(by simp_rw [finSepDegree_bot, IntermediateField.finrank_bot, one_dvd]) (fun L x h ↦ ?_) ⊤
simp only at h ⊢
have hdvd := mul_dvd_mul h <| finSepDegree_adjoin_simple_dvd_finrank L E x
set M := L⟮x⟯
have := Algebra.IsAlgebraic.of_finite L M
rwa [finSepDegree_mul_finSepDegree_of_isAlgebraic F L M,
Module.finrank_mul_finrank F L M] at hdvd
rw [finrank_of_infinite_dimensional hfd]
exact dvd_zero _
/-- The separable degree of a finite extension `E / F` is smaller than the degree of `E / F`. -/
@[stacks 09HA "The inequality"]
theorem finSepDegree_le_finrank [FiniteDimensional F E] :
finSepDegree F E ≤ finrank F E := Nat.le_of_dvd finrank_pos <| finSepDegree_dvd_finrank F E
/-- If `E / F` is a separable extension, then its separable degree is equal to its degree.
When `E / F` is infinite, it means that `Field.Emb F E` has infinitely many elements.
(But the cardinality of `Field.Emb F E` is not equal to `Module.rank F E` in general!) -/
theorem finSepDegree_eq_finrank_of_isSeparable [Algebra.IsSeparable F E] :
finSepDegree F E = finrank F E := by
wlog hfd : FiniteDimensional F E generalizing E with H
· rw [finrank_of_infinite_dimensional hfd]
have halg := Algebra.IsSeparable.isAlgebraic F E
obtain ⟨L, h, h'⟩ := exists_lt_finrank_of_infinite_dimensional hfd (finSepDegree F E)
have : Algebra.IsSeparable F L := Algebra.isSeparable_tower_bot_of_isSeparable F L E
have := (halg.tower_top L)
have hd := finSepDegree_mul_finSepDegree_of_isAlgebraic F L E
rw [H L h] at hd
by_cases hd' : finSepDegree L E = 0
· rw [← hd, hd', mul_zero]
linarith only [h', hd, Nat.le_mul_of_pos_right (finrank F L) (Nat.pos_of_ne_zero hd')]
| rw [← finSepDegree_top F, ← finrank_top F E]
refine induction_on_adjoin (fun K : IntermediateField F E ↦ finSepDegree F K = finrank F K)
(by simp_rw [finSepDegree_bot, IntermediateField.finrank_bot]) (fun L x h ↦ ?_) ⊤
simp only at h ⊢
have heq : _ * _ = _ * _ := congr_arg₂ (· * ·) h <|
(finSepDegree_adjoin_simple_eq_finrank_iff L E x (IsAlgebraic.of_finite L x)).2 <|
IsSeparable.tower_top L (Algebra.IsSeparable.isSeparable F x)
set M := L⟮x⟯
have := Algebra.IsAlgebraic.of_finite L M
rwa [finSepDegree_mul_finSepDegree_of_isAlgebraic F L M,
Module.finrank_mul_finrank F L M] at heq
alias Algebra.IsSeparable.finSepDegree_eq := finSepDegree_eq_finrank_of_isSeparable
/-- If `E / F` is a finite extension, then its separable degree is equal to its degree if and
only if it is a separable extension. -/
@[stacks 09HA "The equality condition"]
theorem finSepDegree_eq_finrank_iff [FiniteDimensional F E] :
finSepDegree F E = finrank F E ↔ Algebra.IsSeparable F E :=
⟨fun heq ↦ ⟨fun x ↦ by
have halg := IsAlgebraic.of_finite F x
refine (finSepDegree_adjoin_simple_eq_finrank_iff F E x halg).1 <| le_antisymm
(finSepDegree_adjoin_simple_le_finrank F E x halg) <| le_of_not_lt fun h ↦ ?_
have := Nat.mul_lt_mul_of_lt_of_le' h (finSepDegree_le_finrank F⟮x⟯ E) Fin.pos'
rw [finSepDegree_mul_finSepDegree_of_isAlgebraic F F⟮x⟯ E,
Module.finrank_mul_finrank F F⟮x⟯ E] at this
linarith only [heq, this]⟩, fun _ ↦ finSepDegree_eq_finrank_of_isSeparable F E⟩
| Mathlib/FieldTheory/SeparableDegree.lean | 759 | 785 |
/-
Copyright (c) 2021 Riccardo Brasca. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Riccardo Brasca
-/
import Mathlib.LinearAlgebra.Dimension.StrongRankCondition
import Mathlib.LinearAlgebra.FreeModule.Finite.Basic
import Mathlib.RingTheory.AlgebraTower
import Mathlib.SetTheory.Cardinal.Finsupp
/-!
# Rank of free modules
## Main result
- `LinearEquiv.nonempty_equiv_iff_lift_rank_eq`:
Two free modules are isomorphic iff they have the same dimension.
- `Module.finBasis`:
An arbitrary basis of a finite free module indexed by `Fin n` given `finrank R M = n`.
-/
noncomputable section
universe u v v' w
open Cardinal Basis Submodule Function Set Module
section Tower
variable (F : Type u) (K : Type v) (A : Type w)
variable [Semiring F] [Semiring K] [AddCommMonoid A]
variable [Module F K] [Module K A] [Module F A] [IsScalarTower F K A]
variable [StrongRankCondition F] [StrongRankCondition K] [Module.Free F K] [Module.Free K A]
/-- Tower law: if `A` is a `K`-module and `K` is an extension of `F` then
$\operatorname{rank}_F(A) = \operatorname{rank}_F(K) * \operatorname{rank}_K(A)$.
The universe polymorphic version of `rank_mul_rank` below. -/
theorem lift_rank_mul_lift_rank :
Cardinal.lift.{w} (Module.rank F K) * Cardinal.lift.{v} (Module.rank K A) =
Cardinal.lift.{v} (Module.rank F A) := by
let b := Module.Free.chooseBasis F K
let c := Module.Free.chooseBasis K A
rw [← (Module.rank F K).lift_id, ← b.mk_eq_rank, ← (Module.rank K A).lift_id, ← c.mk_eq_rank,
← lift_umax.{w, v}, ← (b.smulTower c).mk_eq_rank, mk_prod, lift_mul, lift_lift, lift_lift,
lift_lift, lift_lift, lift_umax.{v, w}]
/-- Tower law: if `A` is a `K`-module and `K` is an extension of `F` then
$\operatorname{rank}_F(A) = \operatorname{rank}_F(K) * \operatorname{rank}_K(A)$.
This is a simpler version of `lift_rank_mul_lift_rank` with `K` and `A` in the same universe. -/
@[stacks 09G9]
theorem rank_mul_rank (A : Type v) [AddCommMonoid A]
[Module K A] [Module F A] [IsScalarTower F K A] [Module.Free K A] :
Module.rank F K * Module.rank K A = Module.rank F A := by
convert lift_rank_mul_lift_rank F K A <;> rw [lift_id]
/-- Tower law: if `A` is a `K`-module and `K` is an extension of `F` then
$\operatorname{rank}_F(A) = \operatorname{rank}_F(K) * \operatorname{rank}_K(A)$. -/
theorem Module.finrank_mul_finrank : finrank F K * finrank K A = finrank F A := by
simp_rw [finrank]
rw [← toNat_lift.{w} (Module.rank F K), ← toNat_lift.{v} (Module.rank K A), ← toNat_mul,
lift_rank_mul_lift_rank, toNat_lift]
end Tower
variable {R : Type u} {M M₁ : Type v} {M' : Type v'}
variable [Semiring R] [StrongRankCondition R]
variable [AddCommMonoid M] [Module R M] [Module.Free R M]
variable [AddCommMonoid M'] [Module R M'] [Module.Free R M']
variable [AddCommMonoid M₁] [Module R M₁] [Module.Free R M₁]
namespace Module.Free
variable (R M)
/-- The rank of a free module `M` over `R` is the cardinality of `ChooseBasisIndex R M`. -/
theorem rank_eq_card_chooseBasisIndex : Module.rank R M = #(ChooseBasisIndex R M) :=
(chooseBasis R M).mk_eq_rank''.symm
/-- The finrank of a free module `M` over `R` is the cardinality of `ChooseBasisIndex R M`. -/
theorem _root_.Module.finrank_eq_card_chooseBasisIndex [Module.Finite R M] :
finrank R M = Fintype.card (ChooseBasisIndex R M) := by
simp [finrank, rank_eq_card_chooseBasisIndex]
/-- The rank of a free module `M` over an infinite scalar ring `R` is the cardinality of `M`
whenever `#R < #M`. -/
lemma rank_eq_mk_of_infinite_lt [Infinite R] (h_lt : lift.{v} #R < lift.{u} #M) :
Module.rank R M = #M := by
have : Infinite M := infinite_iff.mpr <| lift_le.mp <| le_trans (by simp) h_lt.le
have h : lift #M = lift #(ChooseBasisIndex R M →₀ R) := lift_mk_eq'.mpr ⟨(chooseBasis R M).repr⟩
simp only [mk_finsupp_lift_of_infinite', lift_id', ← rank_eq_card_chooseBasisIndex, lift_max,
lift_lift] at h
refine lift_inj.mp ((max_eq_iff.mp h.symm).resolve_right <| not_and_of_not_left _ ?_).left
exact (lift_umax.{v, u}.symm ▸ h_lt).ne
end Module.Free
open Module.Free
open Cardinal
/-- Two vector spaces are isomorphic if they have the same dimension. -/
theorem nonempty_linearEquiv_of_lift_rank_eq
(cnd : Cardinal.lift.{v'} (Module.rank R M) = Cardinal.lift.{v} (Module.rank R M')) :
Nonempty (M ≃ₗ[R] M') := by
obtain ⟨⟨α, B⟩⟩ := Module.Free.exists_basis (R := R) (M := M)
obtain ⟨⟨β, B'⟩⟩ := Module.Free.exists_basis (R := R) (M := M')
have : Cardinal.lift.{v', v} #α = Cardinal.lift.{v, v'} #β := by
rw [B.mk_eq_rank'', cnd, B'.mk_eq_rank'']
exact (Cardinal.lift_mk_eq.{v, v', 0}.1 this).map (B.equiv B')
/-- Two vector spaces are isomorphic if they have the same dimension. -/
theorem nonempty_linearEquiv_of_rank_eq (cond : Module.rank R M = Module.rank R M₁) :
Nonempty (M ≃ₗ[R] M₁) :=
nonempty_linearEquiv_of_lift_rank_eq <| congr_arg _ cond
section
variable (M M' M₁)
/-- Two vector spaces are isomorphic if they have the same dimension. -/
def LinearEquiv.ofLiftRankEq
(cond : Cardinal.lift.{v'} (Module.rank R M) = Cardinal.lift.{v} (Module.rank R M')) :
M ≃ₗ[R] M' :=
Classical.choice (nonempty_linearEquiv_of_lift_rank_eq cond)
/-- Two vector spaces are isomorphic if they have the same dimension. -/
def LinearEquiv.ofRankEq (cond : Module.rank R M = Module.rank R M₁) : M ≃ₗ[R] M₁ :=
Classical.choice (nonempty_linearEquiv_of_rank_eq cond)
end
/-- Two vector spaces are isomorphic if and only if they have the same dimension. -/
theorem LinearEquiv.nonempty_equiv_iff_lift_rank_eq : Nonempty (M ≃ₗ[R] M') ↔
Cardinal.lift.{v'} (Module.rank R M) = Cardinal.lift.{v} (Module.rank R M') :=
⟨fun ⟨h⟩ => LinearEquiv.lift_rank_eq h, fun h => nonempty_linearEquiv_of_lift_rank_eq h⟩
/-- Two vector spaces are isomorphic if and only if they have the same dimension. -/
theorem LinearEquiv.nonempty_equiv_iff_rank_eq :
Nonempty (M ≃ₗ[R] M₁) ↔ Module.rank R M = Module.rank R M₁ :=
⟨fun ⟨h⟩ => LinearEquiv.rank_eq h, fun h => nonempty_linearEquiv_of_rank_eq h⟩
/-- Two finite and free modules are isomorphic if they have the same (finite) rank. -/
theorem FiniteDimensional.nonempty_linearEquiv_of_finrank_eq
[Module.Finite R M] [Module.Finite R M'] (cond : finrank R M = finrank R M') :
Nonempty (M ≃ₗ[R] M') :=
nonempty_linearEquiv_of_lift_rank_eq <| by simp only [← finrank_eq_rank, cond, lift_natCast]
/-- Two finite and free modules are isomorphic if and only if they have the same (finite) rank. -/
theorem FiniteDimensional.nonempty_linearEquiv_iff_finrank_eq [Module.Finite R M]
[Module.Finite R M'] : Nonempty (M ≃ₗ[R] M') ↔ finrank R M = finrank R M' :=
⟨fun ⟨h⟩ => h.finrank_eq, fun h => nonempty_linearEquiv_of_finrank_eq h⟩
variable (M M')
/-- Two finite and free modules are isomorphic if they have the same (finite) rank. -/
noncomputable def LinearEquiv.ofFinrankEq [Module.Finite R M] [Module.Finite R M']
(cond : finrank R M = finrank R M') : M ≃ₗ[R] M' :=
Classical.choice <| FiniteDimensional.nonempty_linearEquiv_of_finrank_eq cond
variable {M M'}
namespace Module
/-- A free module of rank zero is trivial. -/
lemma subsingleton_of_rank_zero (h : Module.rank R M = 0) : Subsingleton M := by
rw [← Basis.mk_eq_rank'' (Module.Free.chooseBasis R M), Cardinal.mk_eq_zero_iff] at h
exact (Module.Free.repr R M).subsingleton
/-- See `rank_lt_aleph0` for the inverse direction without `Module.Free R M`. -/
lemma rank_lt_aleph0_iff : Module.rank R M < ℵ₀ ↔ Module.Finite R M := by
rw [Free.rank_eq_card_chooseBasisIndex, mk_lt_aleph0_iff]
exact ⟨fun h ↦ Finite.of_basis (Free.chooseBasis R M),
fun I ↦ Finite.of_fintype (Free.ChooseBasisIndex R M)⟩
theorem finrank_of_not_finite (h : ¬Module.Finite R M) : finrank R M = 0 := by
rw [finrank, toNat_eq_zero, ← not_lt, Module.rank_lt_aleph0_iff]
exact .inr h
theorem finite_of_finrank_pos (h : 0 < finrank R M) : Module.Finite R M := by
contrapose h
simp [finrank_of_not_finite h]
theorem finite_of_finrank_eq_succ {n : ℕ} (hn : finrank R M = n.succ) : Module.Finite R M :=
finite_of_finrank_pos <| by rw [hn]; exact n.succ_pos
theorem finite_iff_of_rank_eq_nsmul {W} [AddCommMonoid W] [Module R W] [Module.Free R W] {n : ℕ}
(hn : n ≠ 0) (hVW : Module.rank R M = n • Module.rank R W) :
Module.Finite R M ↔ Module.Finite R W := by
simp only [← rank_lt_aleph0_iff, hVW, nsmul_lt_aleph0_iff_of_ne_zero hn]
|
variable (R M)
/-- A finite rank free module has a basis indexed by `Fin (finrank R M)`. -/
| Mathlib/LinearAlgebra/Dimension/Free.lean | 193 | 196 |
/-
Copyright (c) 2018 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes
-/
import Mathlib.Algebra.CharP.Two
import Mathlib.Data.Nat.Cast.Field
import Mathlib.Data.Nat.Factorization.Basic
import Mathlib.Data.Nat.Factorization.Induction
import Mathlib.Data.Nat.Periodic
/-!
# Euler's totient function
This file defines [Euler's totient function](https://en.wikipedia.org/wiki/Euler's_totient_function)
`Nat.totient n` which counts the number of naturals less than `n` that are coprime with `n`.
We prove the divisor sum formula, namely that `n` equals `φ` summed over the divisors of `n`. See
`sum_totient`. We also prove two lemmas to help compute totients, namely `totient_mul` and
`totient_prime_pow`.
-/
assert_not_exists Algebra LinearMap
open Finset
namespace Nat
/-- Euler's totient function. This counts the number of naturals strictly less than `n` which are
coprime with `n`. -/
def totient (n : ℕ) : ℕ := #{a ∈ range n | n.Coprime a}
@[inherit_doc]
scoped notation "φ" => Nat.totient
@[simp]
theorem totient_zero : φ 0 = 0 :=
rfl
@[simp]
theorem totient_one : φ 1 = 1 := rfl
theorem totient_eq_card_coprime (n : ℕ) : φ n = #{a ∈ range n | n.Coprime a} := rfl
/-- A characterisation of `Nat.totient` that avoids `Finset`. -/
theorem totient_eq_card_lt_and_coprime (n : ℕ) : φ n = Nat.card { m | m < n ∧ n.Coprime m } := by
let e : { m | m < n ∧ n.Coprime m } ≃ {x ∈ range n | n.Coprime x} :=
{ toFun := fun m => ⟨m, by simpa only [Finset.mem_filter, Finset.mem_range] using m.property⟩
invFun := fun m => ⟨m, by simpa only [Finset.mem_filter, Finset.mem_range] using m.property⟩
left_inv := fun m => by simp only [Subtype.coe_mk, Subtype.coe_eta]
right_inv := fun m => by simp only [Subtype.coe_mk, Subtype.coe_eta] }
rw [totient_eq_card_coprime, card_congr e, card_eq_fintype_card, Fintype.card_coe]
theorem totient_le (n : ℕ) : φ n ≤ n :=
((range n).card_filter_le _).trans_eq (card_range n)
theorem totient_lt (n : ℕ) (hn : 1 < n) : φ n < n :=
(card_lt_card (filter_ssubset.2 ⟨0, by simp [hn.ne', pos_of_gt hn]⟩)).trans_eq (card_range n)
@[simp]
theorem totient_eq_zero : ∀ {n : ℕ}, φ n = 0 ↔ n = 0
| 0 => by decide
| n + 1 =>
suffices ∃ x < n + 1, (n + 1).gcd x = 1 by simpa [totient, filter_eq_empty_iff]
⟨1 % (n + 1), mod_lt _ n.succ_pos, by rw [gcd_comm, ← gcd_rec, gcd_one_right]⟩
@[simp] theorem totient_pos {n : ℕ} : 0 < φ n ↔ 0 < n := by simp [pos_iff_ne_zero]
instance neZero_totient {n : ℕ} [NeZero n] : NeZero n.totient :=
⟨(totient_pos.mpr <| NeZero.pos n).ne'⟩
theorem filter_coprime_Ico_eq_totient (a n : ℕ) :
#{x ∈ Ico n (n + a) | a.Coprime x} = totient a := by
rw [totient, filter_Ico_card_eq_of_periodic, count_eq_card_filter_range]
exact periodic_coprime a
theorem Ico_filter_coprime_le {a : ℕ} (k n : ℕ) (a_pos : 0 < a) :
#{x ∈ Ico k (k + n) | a.Coprime x} ≤ totient a * (n / a + 1) := by
conv_lhs => rw [← Nat.mod_add_div n a]
induction' n / a with i ih
· rw [← filter_coprime_Ico_eq_totient a k]
simp only [add_zero, mul_one, mul_zero, le_of_lt (mod_lt n a_pos), zero_add]
gcongr
exact le_of_lt (mod_lt n a_pos)
simp only [mul_succ]
simp_rw [← add_assoc] at ih ⊢
calc
#{x ∈ Ico k (k + n % a + a * i + a) | a.Coprime x}
≤ #{x ∈ Ico k (k + n % a + a * i) ∪
Ico (k + n % a + a * i) (k + n % a + a * i + a) | a.Coprime x} := by
gcongr
apply Ico_subset_Ico_union_Ico
_ ≤ #{x ∈ Ico k (k + n % a + a * i) | a.Coprime x} + a.totient := by
rw [filter_union, ← filter_coprime_Ico_eq_totient a (k + n % a + a * i)]
apply card_union_le
_ ≤ a.totient * i + a.totient + a.totient := add_le_add_right ih (totient a)
open ZMod
/-- Note this takes an explicit `Fintype ((ZMod n)ˣ)` argument to avoid trouble with instance
diamonds. -/
@[simp]
theorem _root_.ZMod.card_units_eq_totient (n : ℕ) [NeZero n] [Fintype (ZMod n)ˣ] :
Fintype.card (ZMod n)ˣ = φ n :=
calc
Fintype.card (ZMod n)ˣ = Fintype.card { x : ZMod n // x.val.Coprime n } :=
Fintype.card_congr ZMod.unitsEquivCoprime
_ = φ n := by
obtain ⟨m, rfl⟩ : ∃ m, n = m + 1 := exists_eq_succ_of_ne_zero NeZero.out
simp only [totient, Finset.card_eq_sum_ones, Fintype.card_subtype, Finset.sum_filter, ←
Fin.sum_univ_eq_sum_range, @Nat.coprime_comm (m + 1)]
rfl
theorem totient_even {n : ℕ} (hn : 2 < n) : Even n.totient := by
haveI : Fact (1 < n) := ⟨one_lt_two.trans hn⟩
haveI : NeZero n := NeZero.of_gt hn
suffices 2 = orderOf (-1 : (ZMod n)ˣ) by
rw [← ZMod.card_units_eq_totient, even_iff_two_dvd, this]
exact orderOf_dvd_card
rw [← orderOf_units, Units.coe_neg_one, orderOf_neg_one, ringChar.eq (ZMod n) n, if_neg hn.ne']
theorem totient_mul {m n : ℕ} (h : m.Coprime n) : φ (m * n) = φ m * φ n :=
if hmn0 : m * n = 0 then by
rcases Nat.mul_eq_zero.1 hmn0 with h | h <;>
simp only [totient_zero, mul_zero, zero_mul, h]
else by
haveI : NeZero (m * n) := ⟨hmn0⟩
haveI : NeZero m := ⟨left_ne_zero_of_mul hmn0⟩
haveI : NeZero n := ⟨right_ne_zero_of_mul hmn0⟩
simp only [← ZMod.card_units_eq_totient]
rw [Fintype.card_congr (Units.mapEquiv (ZMod.chineseRemainder h).toMulEquiv).toEquiv,
Fintype.card_congr (@MulEquiv.prodUnits (ZMod m) (ZMod n) _ _).toEquiv, Fintype.card_prod]
/-- For `d ∣ n`, the totient of `n/d` equals the number of values `k < n` such that `gcd n k = d` -/
theorem totient_div_of_dvd {n d : ℕ} (hnd : d ∣ n) :
φ (n / d) = #{k ∈ range n | n.gcd k = d} := by
rcases d.eq_zero_or_pos with (rfl | hd0); · simp [eq_zero_of_zero_dvd hnd]
rcases hnd with ⟨x, rfl⟩
rw [Nat.mul_div_cancel_left x hd0]
apply Finset.card_bij fun k _ => d * k
· simp only [mem_filter, mem_range, and_imp, Coprime]
refine fun a ha1 ha2 => ⟨(mul_lt_mul_left hd0).2 ha1, ?_⟩
rw [gcd_mul_left, ha2, mul_one]
· simp [hd0.ne']
· simp only [mem_filter, mem_range, exists_prop, and_imp]
refine fun b hb1 hb2 => ?_
have : d ∣ b := by
rw [← hb2]
apply gcd_dvd_right
rcases this with ⟨q, rfl⟩
refine ⟨q, ⟨⟨(mul_lt_mul_left hd0).1 hb1, ?_⟩, rfl⟩⟩
rwa [gcd_mul_left, mul_right_eq_self_iff hd0] at hb2
theorem sum_totient (n : ℕ) : n.divisors.sum φ = n := by
rcases n.eq_zero_or_pos with (rfl | hn)
· simp
rw [← sum_div_divisors n φ]
have : n = ∑ d ∈ n.divisors, #{k ∈ range n | n.gcd k = d} := by
nth_rw 1 [← card_range n]
refine card_eq_sum_card_fiberwise fun x _ => mem_divisors.2 ⟨?_, hn.ne'⟩
apply gcd_dvd_left
nth_rw 3 [this]
exact sum_congr rfl fun x hx => totient_div_of_dvd (dvd_of_mem_divisors hx)
theorem sum_totient' (n : ℕ) : ∑ m ∈ range n.succ with m ∣ n, φ m = n := by
convert sum_totient _ using 1
simp only [Nat.divisors, sum_filter, range_eq_Ico]
rw [sum_eq_sum_Ico_succ_bot] <;> simp
/-- When `p` is prime, then the totient of `p ^ (n + 1)` is `p ^ n * (p - 1)` -/
theorem totient_prime_pow_succ {p : ℕ} (hp : p.Prime) (n : ℕ) : φ (p ^ (n + 1)) = p ^ n * (p - 1) :=
calc
φ (p ^ (n + 1)) = #{a ∈ range (p ^ (n + 1)) | (p ^ (n + 1)).Coprime a} :=
totient_eq_card_coprime _
_ = #(range (p ^ (n + 1)) \ (range (p ^ n)).image (· * p)) :=
congr_arg card
(by
rw [sdiff_eq_filter]
apply filter_congr
simp only [mem_range, mem_filter, coprime_pow_left_iff n.succ_pos, mem_image, not_exists,
hp.coprime_iff_not_dvd]
intro a ha
constructor
· intro hap b h; rcases h with ⟨_, rfl⟩
exact hap (dvd_mul_left _ _)
· rintro h ⟨b, rfl⟩
rw [pow_succ'] at ha
exact h b ⟨lt_of_mul_lt_mul_left ha (zero_le _), mul_comm _ _⟩)
_ = _ := by
have h1 : Function.Injective (· * p) := mul_left_injective₀ hp.ne_zero
have h2 : (range (p ^ n)).image (· * p) ⊆ range (p ^ (n + 1)) := fun a => by
simp only [mem_image, mem_range, exists_imp]
rintro b ⟨h, rfl⟩
rw [Nat.pow_succ]
exact (mul_lt_mul_right hp.pos).2 h
rw [card_sdiff h2, Finset.card_image_of_injective _ h1, card_range, card_range, ←
one_mul (p ^ n), pow_succ', ← tsub_mul, one_mul, mul_comm]
/-- When `p` is prime, then the totient of `p ^ n` is `p ^ (n - 1) * (p - 1)` -/
theorem totient_prime_pow {p : ℕ} (hp : p.Prime) {n : ℕ} (hn : 0 < n) :
φ (p ^ n) = p ^ (n - 1) * (p - 1) := by
rcases exists_eq_succ_of_ne_zero (pos_iff_ne_zero.1 hn) with ⟨m, rfl⟩
exact totient_prime_pow_succ hp _
theorem totient_prime {p : ℕ} (hp : p.Prime) : φ p = p - 1 := by
rw [← pow_one p, totient_prime_pow hp] <;> simp
theorem totient_eq_iff_prime {p : ℕ} (hp : 0 < p) : p.totient = p - 1 ↔ p.Prime := by
refine ⟨fun h => ?_, totient_prime⟩
replace hp : 1 < p := by
apply lt_of_le_of_ne
· rwa [succ_le_iff]
· rintro rfl
rw [totient_one, tsub_self] at h
exact one_ne_zero h
rw [totient_eq_card_coprime, range_eq_Ico, ← Ico_insert_succ_left hp.le, Finset.filter_insert,
if_neg (not_coprime_of_dvd_of_dvd hp (dvd_refl p) (dvd_zero p)), ← Nat.card_Ico 1 p] at h
refine
p.prime_of_coprime hp fun n hn hnz => Finset.filter_card_eq h n <| Finset.mem_Ico.mpr ⟨?_, hn⟩
rwa [succ_le_iff, pos_iff_ne_zero]
theorem card_units_zmod_lt_sub_one {p : ℕ} (hp : 1 < p) [Fintype (ZMod p)ˣ] :
Fintype.card (ZMod p)ˣ ≤ p - 1 := by
haveI : NeZero p := ⟨(pos_of_gt hp).ne'⟩
rw [ZMod.card_units_eq_totient p]
exact Nat.le_sub_one_of_lt (Nat.totient_lt p hp)
theorem prime_iff_card_units (p : ℕ) [Fintype (ZMod p)ˣ] :
p.Prime ↔ Fintype.card (ZMod p)ˣ = p - 1 := by
rcases eq_zero_or_neZero p with hp | hp
· subst hp
simp only [ZMod, not_prime_zero, false_iff, zero_tsub]
-- the subst created a non-defeq but subsingleton instance diamond; resolve it
suffices Fintype.card ℤˣ ≠ 0 by convert this
simp
rw [ZMod.card_units_eq_totient, Nat.totient_eq_iff_prime <| NeZero.pos p]
@[simp]
theorem totient_two : φ 2 = 1 :=
(totient_prime prime_two).trans rfl
theorem totient_eq_one_iff : ∀ {n : ℕ}, n.totient = 1 ↔ n = 1 ∨ n = 2
| 0 => by simp
| 1 => by simp
| 2 => by simp
| n + 3 => by
have : 3 ≤ n + 3 := le_add_self
simp only [succ_succ_ne_one, false_or]
exact ⟨fun h => not_even_one.elim <| h ▸ totient_even this, by rintro ⟨⟩⟩
theorem dvd_two_of_totient_le_one {a : ℕ} (han : 0 < a) (ha : a.totient ≤ 1) : a ∣ 2 := by
rcases totient_eq_one_iff.mp <| le_antisymm ha <| totient_pos.2 han with rfl | rfl <;> norm_num
/-! ### Euler's product formula for the totient function
We prove several different statements of this formula. -/
/-- Euler's product formula for the totient function. -/
theorem totient_eq_prod_factorization {n : ℕ} (hn : n ≠ 0) :
φ n = n.factorization.prod fun p k => p ^ (k - 1) * (p - 1) := by
rw [multiplicative_factorization φ (@totient_mul) totient_one hn]
apply Finsupp.prod_congr _
intro p hp
have h := zero_lt_iff.mpr (Finsupp.mem_support_iff.mp hp)
rw [totient_prime_pow (prime_of_mem_primeFactors hp) h]
/-- Euler's product formula for the totient function. -/
theorem totient_mul_prod_primeFactors (n : ℕ) :
(φ n * ∏ p ∈ n.primeFactors, p) = n * ∏ p ∈ n.primeFactors, (p - 1) := by
by_cases hn : n = 0; · simp [hn]
rw [totient_eq_prod_factorization hn]
nth_rw 3 [← factorization_prod_pow_eq_self hn]
simp only [prod_primeFactors_prod_factorization, ← Finsupp.prod_mul]
refine Finsupp.prod_congr (M := ℕ) (N := ℕ) fun p hp => ?_
rw [Finsupp.mem_support_iff, ← zero_lt_iff] at hp
rw [mul_comm, ← mul_assoc, ← pow_succ', Nat.sub_one, Nat.succ_pred_eq_of_pos hp]
/-- Euler's product formula for the totient function. -/
theorem totient_eq_div_primeFactors_mul (n : ℕ) :
φ n = (n / ∏ p ∈ n.primeFactors, p) * ∏ p ∈ n.primeFactors, (p - 1) := by
rw [← mul_div_left n.totient, totient_mul_prod_primeFactors, mul_comm,
Nat.mul_div_assoc _ (prod_primeFactors_dvd n), mul_comm]
exact prod_pos (fun p => pos_of_mem_primeFactors)
/-- Euler's product formula for the totient function. -/
theorem totient_eq_mul_prod_factors (n : ℕ) :
(φ n : ℚ) = n * ∏ p ∈ n.primeFactors, (1 - (p : ℚ)⁻¹) := by
by_cases hn : n = 0
· simp [hn]
have hn' : (n : ℚ) ≠ 0 := by simp [hn]
have hpQ : (∏ p ∈ n.primeFactors, (p : ℚ)) ≠ 0 := by
rw [← cast_prod, cast_ne_zero, ← zero_lt_iff, prod_primeFactors_prod_factorization]
exact prod_pos fun p hp => pos_of_mem_primeFactors hp
simp only [totient_eq_div_primeFactors_mul n, prod_primeFactors_dvd n, cast_mul, cast_prod,
cast_div_charZero, mul_comm_div, mul_right_inj' hn', div_eq_iff hpQ, ← prod_mul_distrib]
refine prod_congr rfl fun p hp => ?_
have hp := pos_of_mem_primeFactorsList (List.mem_toFinset.mp hp)
have hp' : (p : ℚ) ≠ 0 := cast_ne_zero.mpr hp.ne.symm
rw [sub_mul, one_mul, mul_comm, mul_inv_cancel₀ hp', cast_pred hp]
theorem totient_gcd_mul_totient_mul (a b : ℕ) : φ (a.gcd b) * φ (a * b) = φ a * φ b * a.gcd b := by
have shuffle :
∀ a1 a2 b1 b2 c1 c2 : ℕ,
b1 ∣ a1 → b2 ∣ a2 → a1 / b1 * c1 * (a2 / b2 * c2) = a1 * a2 / (b1 * b2) * (c1 * c2) := by
intro a1 a2 b1 b2 c1 c2 h1 h2
calc
a1 / b1 * c1 * (a2 / b2 * c2) = a1 / b1 * (a2 / b2) * (c1 * c2) := by apply mul_mul_mul_comm
_ = a1 * a2 / (b1 * b2) * (c1 * c2) := by
congr 1
exact div_mul_div_comm h1 h2
simp only [totient_eq_div_primeFactors_mul]
rw [shuffle, shuffle]
rotate_left
repeat' apply prod_primeFactors_dvd
simp only [prod_primeFactors_gcd_mul_prod_primeFactors_mul]
rw [eq_comm, mul_comm, ← mul_assoc, ← Nat.mul_div_assoc]
exact mul_dvd_mul (prod_primeFactors_dvd a) (prod_primeFactors_dvd b)
theorem totient_super_multiplicative (a b : ℕ) : φ a * φ b ≤ φ (a * b) := by
let d := a.gcd b
rcases (zero_le a).eq_or_lt with (rfl | ha0)
· simp
have hd0 : 0 < d := Nat.gcd_pos_of_pos_left _ ha0
apply le_of_mul_le_mul_right _ hd0
rw [← totient_gcd_mul_totient_mul a b, mul_comm]
apply mul_le_mul_left' (Nat.totient_le d)
theorem totient_dvd_of_dvd {a b : ℕ} (h : a ∣ b) : φ a ∣ φ b := by
rcases eq_or_ne a 0 with (rfl | ha0)
· simp [zero_dvd_iff.1 h]
rcases eq_or_ne b 0 with (rfl | hb0)
· simp
have hab' := primeFactors_mono h hb0
rw [totient_eq_prod_factorization ha0, totient_eq_prod_factorization hb0]
refine Finsupp.prod_dvd_prod_of_subset_of_dvd hab' fun p _ => mul_dvd_mul ?_ dvd_rfl
exact pow_dvd_pow p (tsub_le_tsub_right ((factorization_le_iff_dvd ha0 hb0).2 h p) 1)
theorem totient_mul_of_prime_of_dvd {p n : ℕ} (hp : p.Prime) (h : p ∣ n) :
(p * n).totient = p * n.totient := by
have h1 := totient_gcd_mul_totient_mul p n
rw [gcd_eq_left h, mul_assoc] at h1
simpa [(totient_pos.2 hp.pos).ne', mul_comm] using h1
theorem totient_mul_of_prime_of_not_dvd {p n : ℕ} (hp : p.Prime) (h : ¬p ∣ n) :
(p * n).totient = (p - 1) * n.totient := by
rw [totient_mul _, totient_prime hp]
simpa [h] using coprime_or_dvd_of_prime hp n
end Nat
| Mathlib/Data/Nat/Totient.lean | 377 | 380 | |
/-
Copyright (c) 2023 Joël Riou. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Joël Riou
-/
import Mathlib.Algebra.Homology.HomotopyCategory.HomComplex
import Mathlib.Algebra.Homology.HomotopyCategory.Shift
/-! Shifting cochains
Let `C` be a preadditive category. Given two cochain complexes (indexed by `ℤ`),
the type of cochains `HomComplex.Cochain K L n` of degree `n` was introduced
in `Mathlib.Algebra.Homology.HomotopyCategory.HomComplex`. In this file, we
study how these cochains behave with respect to the shift on the complexes `K`
and `L`.
When `n`, `a`, `n'` are integers such that `h : n' + a = n`,
we obtain `rightShiftAddEquiv K L n a n' h : Cochain K L n ≃+ Cochain K (L⟦a⟧) n'`.
This definition does not involve signs, but the analogous definition
of `leftShiftAddEquiv K L n a n' h' : Cochain K L n ≃+ Cochain (K⟦a⟧) L n'`
when `h' : n + a = n'` does involve signs, as we follow the conventions
appearing in the introduction of
[Brian Conrad's book *Grothendieck duality and base change*][conrad2000].
## References
* [Brian Conrad, Grothendieck duality and base change][conrad2000]
-/
assert_not_exists TwoSidedIdeal
open CategoryTheory Category Limits Preadditive
universe v u
variable {C : Type u} [Category.{v} C] [Preadditive C] {R : Type*} [Ring R] [Linear R C]
{K L M : CochainComplex C ℤ} {n : ℤ}
namespace CochainComplex.HomComplex
namespace Cochain
variable (γ γ₁ γ₂ : Cochain K L n)
/-- The map `Cochain K L n → Cochain K (L⟦a⟧) n'` when `n' + a = n`. -/
def rightShift (a n' : ℤ) (hn' : n' + a = n) : Cochain K (L⟦a⟧) n' :=
Cochain.mk (fun p q hpq => γ.v p (p + n) rfl ≫
(L.shiftFunctorObjXIso a q (p + n) (by omega)).inv)
lemma rightShift_v (a n' : ℤ) (hn' : n' + a = n) (p q : ℤ) (hpq : p + n' = q)
(p' : ℤ) (hp' : p + n = p') :
(γ.rightShift a n' hn').v p q hpq = γ.v p p' hp' ≫
(L.shiftFunctorObjXIso a q p' (by rw [← hp', ← hpq, ← hn', add_assoc])).inv := by
subst hp'
dsimp only [rightShift]
simp only [mk_v]
/-- The map `Cochain K L n → Cochain (K⟦a⟧) L n'` when `n + a = n'`. -/
def leftShift (a n' : ℤ) (hn' : n + a = n') : Cochain (K⟦a⟧) L n' :=
Cochain.mk (fun p q hpq => (a * n' + ((a * (a-1))/2)).negOnePow •
(K.shiftFunctorObjXIso a p (p + a) rfl).hom ≫ γ.v (p+a) q (by omega))
lemma leftShift_v (a n' : ℤ) (hn' : n + a = n') (p q : ℤ) (hpq : p + n' = q)
(p' : ℤ) (hp' : p' + n = q) :
(γ.leftShift a n' hn').v p q hpq = (a * n' + ((a * (a - 1))/2)).negOnePow •
(K.shiftFunctorObjXIso a p p'
(by rw [← add_left_inj n, hp', add_assoc, add_comm a, hn', hpq])).hom ≫ γ.v p' q hp' := by
obtain rfl : p' = p + a := by omega
dsimp only [leftShift]
simp only [mk_v]
/-- The map `Cochain K (L⟦a⟧) n' → Cochain K L n` when `n' + a = n`. -/
def rightUnshift {n' a : ℤ} (γ : Cochain K (L⟦a⟧) n') (n : ℤ) (hn : n' + a = n) :
Cochain K L n :=
Cochain.mk (fun p q hpq => γ.v p (p + n') rfl ≫
(L.shiftFunctorObjXIso a (p + n') q (by rw [← hpq, add_assoc, hn])).hom)
lemma rightUnshift_v {n' a : ℤ} (γ : Cochain K (L⟦a⟧) n') (n : ℤ) (hn : n' + a = n)
(p q : ℤ) (hpq : p + n = q) (p' : ℤ) (hp' : p + n' = p') :
(γ.rightUnshift n hn).v p q hpq = γ.v p p' hp' ≫
(L.shiftFunctorObjXIso a p' q (by rw [← hpq, ← hn, ← add_assoc, hp'])).hom := by
subst hp'
dsimp only [rightUnshift]
simp only [mk_v]
/-- The map `Cochain (K⟦a⟧) L n' → Cochain K L n` when `n + a = n'`. -/
def leftUnshift {n' a : ℤ} (γ : Cochain (K⟦a⟧) L n') (n : ℤ) (hn : n + a = n') :
Cochain K L n :=
Cochain.mk (fun p q hpq => (a * n' + ((a * (a-1))/2)).negOnePow •
(K.shiftFunctorObjXIso a (p - a) p (by omega)).inv ≫ γ.v (p-a) q (by omega))
lemma leftUnshift_v {n' a : ℤ} (γ : Cochain (K⟦a⟧) L n') (n : ℤ) (hn : n + a = n')
(p q : ℤ) (hpq : p + n = q) (p' : ℤ) (hp' : p' + n' = q) :
(γ.leftUnshift n hn).v p q hpq = (a * n' + ((a * (a-1))/2)).negOnePow •
(K.shiftFunctorObjXIso a p' p (by omega)).inv ≫ γ.v p' q (by omega) := by
obtain rfl : p' = p - a := by omega
rfl
/-- The map `Cochain K L n → Cochain (K⟦a⟧) (L⟦a⟧) n`. -/
def shift (a : ℤ) : Cochain (K⟦a⟧) (L⟦a⟧) n :=
Cochain.mk (fun p q hpq => (K.shiftFunctorObjXIso a p _ rfl).hom ≫
γ.v (p + a) (q + a) (by omega) ≫ (L.shiftFunctorObjXIso a q _ rfl).inv)
lemma shift_v (a : ℤ) (p q : ℤ) (hpq : p + n = q) (p' q' : ℤ)
(hp' : p' = p + a) (hq' : q' = q + a) :
(γ.shift a).v p q hpq = (K.shiftFunctorObjXIso a p p' hp').hom ≫
γ.v p' q' (by rw [hp', hq', ← hpq, add_assoc, add_comm a, add_assoc]) ≫
(L.shiftFunctorObjXIso a q q' hq').inv := by
subst hp' hq'
rfl
lemma shift_v' (a : ℤ) (p q : ℤ) (hpq : p + n = q) :
(γ.shift a).v p q hpq = γ.v (p + a) (q + a) (by omega) := by
simp only [shift_v γ a p q hpq _ _ rfl rfl, shiftFunctor_obj_X, shiftFunctorObjXIso,
HomologicalComplex.XIsoOfEq_rfl, Iso.refl_hom, Iso.refl_inv, comp_id, id_comp]
@[simp]
lemma rightUnshift_rightShift (a n' : ℤ) (hn' : n' + a = n) :
(γ.rightShift a n' hn').rightUnshift n hn' = γ := by
ext p q hpq
simp only [rightUnshift_v _ n hn' p q hpq (p + n') rfl,
γ.rightShift_v _ _ hn' p (p + n') rfl q hpq,
shiftFunctorObjXIso, assoc, Iso.inv_hom_id, comp_id]
@[simp]
lemma rightShift_rightUnshift {a n' : ℤ} (γ : Cochain K (L⟦a⟧) n') (n : ℤ) (hn' : n' + a = n) :
(γ.rightUnshift n hn').rightShift a n' hn' = γ := by
ext p q hpq
simp only [(γ.rightUnshift n hn').rightShift_v a n' hn' p q hpq (p + n) rfl,
γ.rightUnshift_v n hn' p (p + n) rfl q hpq,
shiftFunctorObjXIso, assoc, Iso.hom_inv_id, comp_id]
@[simp]
lemma leftUnshift_leftShift (a n' : ℤ) (hn' : n + a = n') :
(γ.leftShift a n' hn').leftUnshift n hn' = γ := by
ext p q hpq
rw [(γ.leftShift a n' hn').leftUnshift_v n hn' p q hpq (q-n') (by omega),
γ.leftShift_v a n' hn' (q-n') q (by omega) p hpq, Linear.comp_units_smul,
Iso.inv_hom_id_assoc, smul_smul, Int.units_mul_self, one_smul]
@[simp]
lemma leftShift_leftUnshift {a n' : ℤ} (γ : Cochain (K⟦a⟧) L n') (n : ℤ) (hn' : n + a = n') :
(γ.leftUnshift n hn').leftShift a n' hn' = γ := by
ext p q hpq
rw [(γ.leftUnshift n hn').leftShift_v a n' hn' p q hpq (q-n) (by omega),
γ.leftUnshift_v n hn' (q-n) q (by omega) p hpq, Linear.comp_units_smul, smul_smul,
Iso.hom_inv_id_assoc, Int.units_mul_self, one_smul]
@[simp]
lemma rightShift_add (a n' : ℤ) (hn' : n' + a = n) :
(γ₁ + γ₂).rightShift a n' hn' = γ₁.rightShift a n' hn' + γ₂.rightShift a n' hn' := by
ext p q hpq
dsimp
simp only [rightShift_v _ a n' hn' p q hpq _ rfl, add_v, add_comp]
@[simp]
lemma leftShift_add (a n' : ℤ) (hn' : n + a = n') :
(γ₁ + γ₂).leftShift a n' hn' = γ₁.leftShift a n' hn' + γ₂.leftShift a n' hn' := by
ext p q hpq
dsimp
simp only [leftShift_v _ a n' hn' p q hpq (p + a) (by omega), add_v, comp_add, smul_add]
@[simp]
lemma shift_add (a : ℤ) :
(γ₁ + γ₂).shift a = γ₁.shift a + γ₂.shift a := by
ext p q hpq
dsimp
simp only [shift_v', add_v]
variable (K L)
/-- The additive equivalence `Cochain K L n ≃+ Cochain K L⟦a⟧ n'` when `n' + a = n`. -/
@[simps]
def rightShiftAddEquiv (n a n' : ℤ) (hn' : n' + a = n) :
Cochain K L n ≃+ Cochain K (L⟦a⟧) n' where
toFun γ := γ.rightShift a n' hn'
invFun γ := γ.rightUnshift n hn'
left_inv γ := by simp only [rightUnshift_rightShift]
right_inv γ := by simp only [rightShift_rightUnshift]
map_add' γ γ' := by simp only [rightShift_add]
/-- The additive equivalence `Cochain K L n ≃+ Cochain (K⟦a⟧) L n'` when `n + a = n'`. -/
@[simps]
def leftShiftAddEquiv (n a n' : ℤ) (hn' : n + a = n') :
Cochain K L n ≃+ Cochain (K⟦a⟧) L n' where
toFun γ := γ.leftShift a n' hn'
invFun γ := γ.leftUnshift n hn'
left_inv γ := by simp only [leftUnshift_leftShift]
right_inv γ := by simp only [leftShift_leftUnshift]
map_add' γ γ' := by simp only [leftShift_add]
/-- The additive map `Cochain K L n →+ Cochain (K⟦a⟧) (L⟦a⟧) n`. -/
@[simps!]
def shiftAddHom (n a : ℤ) : Cochain K L n →+ Cochain (K⟦a⟧) (L⟦a⟧) n :=
AddMonoidHom.mk' (fun γ => γ.shift a) (by intros; dsimp; simp only [shift_add])
variable (n)
@[simp]
lemma rightShift_zero (a n' : ℤ) (hn' : n' + a = n) :
(0 : Cochain K L n).rightShift a n' hn' = 0 := by
change rightShiftAddEquiv K L n a n' hn' 0 = 0
apply map_zero
@[simp]
lemma rightUnshift_zero (a n' : ℤ) (hn' : n' + a = n) :
(0 : Cochain K (L⟦a⟧) n').rightUnshift n hn' = 0 := by
change (rightShiftAddEquiv K L n a n' hn').symm 0 = 0
apply map_zero
@[simp]
lemma leftShift_zero (a n' : ℤ) (hn' : n + a = n') :
(0 : Cochain K L n).leftShift a n' hn' = 0 := by
change leftShiftAddEquiv K L n a n' hn' 0 = 0
apply map_zero
@[simp]
lemma leftUnshift_zero (a n' : ℤ) (hn' : n + a = n') :
(0 : Cochain (K⟦a⟧) L n').leftUnshift n hn' = 0 := by
change (leftShiftAddEquiv K L n a n' hn').symm 0 = 0
apply map_zero
@[simp]
lemma shift_zero (a : ℤ) :
(0 : Cochain K L n).shift a = 0 := by
change shiftAddHom K L n a 0 = 0
apply map_zero
variable {K L n}
@[simp]
lemma rightShift_neg (a n' : ℤ) (hn' : n' + a = n) :
(-γ).rightShift a n' hn' = -γ.rightShift a n' hn' := by
change rightShiftAddEquiv K L n a n' hn' (-γ) = _
apply map_neg
@[simp]
lemma rightUnshift_neg {n' a : ℤ} (γ : Cochain K (L⟦a⟧) n') (n : ℤ) (hn : n' + a = n) :
(-γ).rightUnshift n hn = -γ.rightUnshift n hn := by
change (rightShiftAddEquiv K L n a n' hn).symm (-γ) = _
apply map_neg
@[simp]
lemma leftShift_neg (a n' : ℤ) (hn' : n + a = n') :
(-γ).leftShift a n' hn' = -γ.leftShift a n' hn' := by
change leftShiftAddEquiv K L n a n' hn' (-γ) = _
apply map_neg
@[simp]
lemma leftUnshift_neg {n' a : ℤ} (γ : Cochain (K⟦a⟧) L n') (n : ℤ) (hn : n + a = n') :
(-γ).leftUnshift n hn = -γ.leftUnshift n hn := by
change (leftShiftAddEquiv K L n a n' hn).symm (-γ) = _
apply map_neg
@[simp]
lemma shift_neg (a : ℤ) :
(-γ).shift a = -γ.shift a := by
change shiftAddHom K L n a (-γ) = _
apply map_neg
@[simp]
lemma rightUnshift_add {n' a : ℤ} (γ₁ γ₂ : Cochain K (L⟦a⟧) n') (n : ℤ) (hn : n' + a = n) :
(γ₁ + γ₂).rightUnshift n hn = γ₁.rightUnshift n hn + γ₂.rightUnshift n hn := by
change (rightShiftAddEquiv K L n a n' hn).symm (γ₁ + γ₂) = _
apply map_add
@[simp]
lemma leftUnshift_add {n' a : ℤ} (γ₁ γ₂ : Cochain (K⟦a⟧) L n') (n : ℤ) (hn : n + a = n') :
(γ₁ + γ₂).leftUnshift n hn = γ₁.leftUnshift n hn + γ₂.leftUnshift n hn := by
change (leftShiftAddEquiv K L n a n' hn).symm (γ₁ + γ₂) = _
apply map_add
@[simp]
lemma rightShift_smul (a n' : ℤ) (hn' : n' + a = n) (x : R) :
(x • γ).rightShift a n' hn' = x • γ.rightShift a n' hn' := by
ext p q hpq
dsimp
simp only [rightShift_v _ a n' hn' p q hpq _ rfl, smul_v, Linear.smul_comp]
@[simp]
lemma leftShift_smul (a n' : ℤ) (hn' : n + a = n') (x : R) :
(x • γ).leftShift a n' hn' = x • γ.leftShift a n' hn' := by
ext p q hpq
dsimp
simp only [leftShift_v _ a n' hn' p q hpq (p + a) (by omega), smul_v, Linear.comp_smul,
smul_comm x]
@[simp]
lemma shift_smul (a : ℤ) (x : R) :
(x • γ).shift a = x • (γ.shift a) := by
ext p q hpq
dsimp
simp only [shift_v', smul_v]
variable (K L R)
/-- The linear equivalence `Cochain K L n ≃+ Cochain K L⟦a⟧ n'` when `n' + a = n` and
the category is `R`-linear. -/
@[simps!]
def rightShiftLinearEquiv (n a n' : ℤ) (hn' : n' + a = n) :
Cochain K L n ≃ₗ[R] Cochain K (L⟦a⟧) n' :=
(rightShiftAddEquiv K L n a n' hn').toLinearEquiv
(fun x γ => by dsimp; simp only [rightShift_smul])
/-- The additive equivalence `Cochain K L n ≃+ Cochain (K⟦a⟧) L n'` when `n + a = n'` and
the category is `R`-linear. -/
@[simps!]
def leftShiftLinearEquiv (n a n' : ℤ) (hn : n + a = n') :
Cochain K L n ≃ₗ[R] Cochain (K⟦a⟧) L n' :=
(leftShiftAddEquiv K L n a n' hn).toLinearEquiv
(fun x γ => by dsimp; simp only [leftShift_smul])
/-- The linear map `Cochain K L n ≃+ Cochain (K⟦a⟧) (L⟦a⟧) n` when the category is `R`-linear. -/
@[simps!]
def shiftLinearMap (n a : ℤ) :
Cochain K L n →ₗ[R] Cochain (K⟦a⟧) (L⟦a⟧) n where
toAddHom := shiftAddHom K L n a
map_smul' _ _ := by dsimp; simp only [shift_smul]
variable {K L R}
@[simp]
lemma rightShift_units_smul (a n' : ℤ) (hn' : n' + a = n) (x : Rˣ) :
(x • γ).rightShift a n' hn' = x • γ.rightShift a n' hn' := by
apply rightShift_smul
@[simp]
lemma leftShift_units_smul (a n' : ℤ) (hn' : n + a = n') (x : Rˣ) :
(x • γ).leftShift a n' hn' = x • γ.leftShift a n' hn' := by
apply leftShift_smul
@[simp]
lemma shift_units_smul (a : ℤ) (x : Rˣ) :
(x • γ).shift a = x • (γ.shift a) := by
ext p q hpq
dsimp
simp only [shift_v', units_smul_v]
@[simp]
lemma rightUnshift_smul {n' a : ℤ} (γ : Cochain K (L⟦a⟧) n') (n : ℤ) (hn : n' + a = n) (x : R) :
(x • γ).rightUnshift n hn = x • γ.rightUnshift n hn := by
change (rightShiftLinearEquiv R K L n a n' hn).symm (x • γ) = _
apply map_smul
@[simp]
lemma rightUnshift_units_smul {n' a : ℤ} (γ : Cochain K (L⟦a⟧) n') (n : ℤ)
(hn : n' + a = n) (x : Rˣ) :
(x • γ).rightUnshift n hn = x • γ.rightUnshift n hn := by
apply rightUnshift_smul
@[simp]
lemma leftUnshift_smul {n' a : ℤ} (γ : Cochain (K⟦a⟧) L n') (n : ℤ) (hn : n + a = n') (x : R) :
(x • γ).leftUnshift n hn = x • γ.leftUnshift n hn := by
change (leftShiftLinearEquiv R K L n a n' hn).symm (x • γ) = _
apply map_smul
@[simp]
lemma leftUnshift_units_smul {n' a : ℤ} (γ : Cochain (K⟦a⟧) L n') (n : ℤ)
(hn : n + a = n') (x : Rˣ) :
(x • γ).leftUnshift n hn = x • γ.leftUnshift n hn := by
apply leftUnshift_smul
lemma rightUnshift_comp {m : ℤ} {a : ℤ} (γ' : Cochain L (M⟦a⟧) m) {nm : ℤ} (hnm : n + m = nm)
(nm' : ℤ) (hnm' : nm + a = nm') (m' : ℤ) (hm' : m + a = m') :
(γ.comp γ' hnm).rightUnshift nm' hnm' =
γ.comp (γ'.rightUnshift m' hm') (by omega) := by
ext p q hpq
rw [(γ.comp γ' hnm).rightUnshift_v nm' hnm' p q hpq (p + n + m) (by omega),
γ.comp_v γ' hnm p (p + n) (p + n + m) rfl rfl,
comp_v _ _ (show n + m' = nm' by omega) p (p + n) q (by omega) (by omega),
γ'.rightUnshift_v m' hm' (p + n) q (by omega) (p + n + m) rfl, assoc]
lemma leftShift_comp (a n' : ℤ) (hn' : n + a = n') {m t t' : ℤ} (γ' : Cochain L M m)
(h : n + m = t) (ht' : t + a = t') :
(γ.comp γ' h).leftShift a t' ht' = (a * m).negOnePow • (γ.leftShift a n' hn').comp γ'
(by rw [← ht', ← h, ← hn', add_assoc, add_comm a, add_assoc]) := by
ext p q hpq
have h' : n' + m = t' := by omega
dsimp
simp only [Cochain.comp_v _ _ h' p (p + n') q rfl (by omega),
γ.leftShift_v a n' hn' p (p + n') rfl (p + a) (by omega),
(γ.comp γ' h).leftShift_v a t' (by omega) p q hpq (p + a) (by omega),
smul_smul, Linear.units_smul_comp, assoc, Int.negOnePow_add, ← mul_assoc, ← h',
comp_v _ _ h (p + a) (p + n') q (by omega) (by omega)]
congr 2
rw [add_comm n', mul_add, Int.negOnePow_add]
@[simp]
lemma leftShift_comp_zero_cochain (a n' : ℤ) (hn' : n + a = n') (γ' : Cochain L M 0) :
(γ.comp γ' (add_zero n)).leftShift a n' hn' =
(γ.leftShift a n' hn').comp γ' (add_zero n') := by
rw [leftShift_comp γ a n' hn' γ' (add_zero _) hn', mul_zero, Int.negOnePow_zero, one_smul]
lemma δ_rightShift (a n' m' : ℤ) (hn' : n' + a = n) (m : ℤ) (hm' : m' + a = m) :
δ n' m' (γ.rightShift a n' hn') = a.negOnePow • (δ n m γ).rightShift a m' hm' := by
by_cases hnm : n + 1 = m
· have hnm' : n' + 1 = m' := by omega
ext p q hpq
dsimp
rw [(δ n m γ).rightShift_v a m' hm' p q hpq _ rfl,
δ_v n m hnm _ p (p+m) rfl (p+n) (p+1) (by omega) rfl,
δ_v n' m' hnm' _ p q hpq (p+n') (p+1) (by omega) rfl,
γ.rightShift_v a n' hn' p (p+n') rfl (p+n) rfl,
γ.rightShift_v a n' hn' (p+1) q _ (p+m) (by omega)]
simp only [shiftFunctorObjXIso, shiftFunctor_obj_d',
Linear.comp_units_smul, assoc, HomologicalComplex.XIsoOfEq_inv_comp_d,
add_comp, HomologicalComplex.d_comp_XIsoOfEq_inv, Linear.units_smul_comp, smul_add,
add_right_inj, smul_smul]
congr 1
simp only [← hm', add_comm m', Int.negOnePow_add, ← mul_assoc,
Int.units_mul_self, one_mul]
· have hnm' : ¬ n' + 1 = m' := fun _ => hnm (by omega)
rw [δ_shape _ _ hnm', δ_shape _ _ hnm, rightShift_zero, smul_zero]
lemma δ_rightUnshift {a n' : ℤ} (γ : Cochain K (L⟦a⟧) n') (n : ℤ) (hn : n' + a = n)
| (m m' : ℤ) (hm' : m' + a = m) :
δ n m (γ.rightUnshift n hn) = a.negOnePow • (δ n' m' γ).rightUnshift m hm' := by
obtain ⟨γ', rfl⟩ := (rightShiftAddEquiv K L n a n' hn).surjective γ
dsimp
simp only [rightUnshift_rightShift, γ'.δ_rightShift a n' m' hn m hm', rightUnshift_units_smul,
smul_smul, Int.units_mul_self, one_smul]
lemma δ_leftShift (a n' m' : ℤ) (hn' : n + a = n') (m : ℤ) (hm' : m + a = m') :
δ n' m' (γ.leftShift a n' hn') = a.negOnePow • (δ n m γ).leftShift a m' hm' := by
by_cases hnm : n + 1 = m
· have hnm' : n' + 1 = m' := by omega
ext p q hpq
dsimp
rw [(δ n m γ).leftShift_v a m' hm' p q hpq (p+a) (by omega),
δ_v n m hnm _ (p+a) q (by omega) (p+n') (p+1+a) (by omega) (by omega),
δ_v n' m' hnm' _ p q hpq (p+n') (p+1) (by omega) rfl,
γ.leftShift_v a n' hn' p (p+n') rfl (p+a) (by omega),
γ.leftShift_v a n' hn' (p+1) q (by omega) (p+1+a) (by omega)]
simp only [shiftFunctor_obj_X, shiftFunctorObjXIso, HomologicalComplex.XIsoOfEq_rfl,
Iso.refl_hom, id_comp, Linear.units_smul_comp, shiftFunctor_obj_d',
Linear.comp_units_smul, smul_add, smul_smul]
congr 2
| Mathlib/Algebra/Homology/HomotopyCategory/HomComplexShift.lean | 416 | 437 |
/-
Copyright (c) 2024 Arend Mellendijk. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Arend Mellendijk
-/
import Mathlib.Analysis.SpecialFunctions.Integrals
import Mathlib.Analysis.SumIntegralComparisons
import Mathlib.NumberTheory.Harmonic.Defs
/-!
This file proves $\log(n+1) \le H_n \le 1 + \log(n)$ for all natural numbers $n$.
-/
| lemma harmonic_eq_sum_Icc {n : ℕ} : harmonic n = ∑ i ∈ Finset.Icc 1 n, (↑i)⁻¹ := by
rw [harmonic, Finset.range_eq_Ico, Finset.sum_Ico_add' (fun (i : ℕ) ↦ (i : ℚ)⁻¹) 0 n (c := 1)]
-- It might be better to restate `Nat.Ico_succ_right` in terms of `+ 1`,
-- as we try to move away from `Nat.succ`.
simp only [Nat.add_one, Nat.Ico_succ_right]
theorem log_add_one_le_harmonic (n : ℕ) :
Real.log ↑(n+1) ≤ harmonic n := by
| Mathlib/NumberTheory/Harmonic/Bounds.lean | 17 | 24 |
/-
Copyright (c) 2021 Oliver Nash. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Oliver Nash
-/
import Mathlib.Algebra.Lie.Ideal
/-!
# Ideal operations for Lie algebras
Given a Lie module `M` over a Lie algebra `L`, there is a natural action of the Lie ideals of `L`
on the Lie submodules of `M`. In the special case that `M = L` with the adjoint action, this
provides a pairing of Lie ideals which is especially important. For example, it can be used to
define solvability / nilpotency of a Lie algebra via the derived / lower-central series.
## Main definitions
* `LieSubmodule.hasBracket`
* `LieSubmodule.lieIdeal_oper_eq_linear_span`
* `LieIdeal.map_bracket_le`
* `LieIdeal.comap_bracket_le`
## Notation
Given a Lie module `M` over a Lie algebra `L`, together with a Lie submodule `N ⊆ M` and a Lie
ideal `I ⊆ L`, we introduce the notation `⁅I, N⁆` for the Lie submodule of `M` corresponding to
the action defined in this file.
## Tags
lie algebra, ideal operation
-/
universe u v w w₁ w₂
namespace LieSubmodule
variable {R : Type u} {L : Type v} {M : Type w} {M₂ : Type w₁}
variable [CommRing R] [LieRing L]
variable [AddCommGroup M] [Module R M] [LieRingModule L M]
variable [AddCommGroup M₂] [Module R M₂] [LieRingModule L M₂]
variable (N N' : LieSubmodule R L M) (N₂ : LieSubmodule R L M₂)
variable (f : M →ₗ⁅R,L⁆ M₂)
section LieIdealOperations
theorem map_comap_le : map f (comap f N₂) ≤ N₂ :=
(N₂ : Set M₂).image_preimage_subset f
theorem map_comap_eq (hf : N₂ ≤ f.range) : map f (comap f N₂) = N₂ := by
rw [SetLike.ext'_iff]
exact Set.image_preimage_eq_of_subset hf
theorem le_comap_map : N ≤ comap f (map f N) :=
(N : Set M).subset_preimage_image f
theorem comap_map_eq (hf : f.ker = ⊥) : comap f (map f N) = N := by
rw [SetLike.ext'_iff]
exact (N : Set M).preimage_image_eq (f.ker_eq_bot.mp hf)
@[simp]
theorem map_comap_incl : map N.incl (comap N.incl N') = N ⊓ N' := by
rw [← toSubmodule_inj]
exact (N : Submodule R M).map_comap_subtype N'
variable [LieAlgebra R L] [LieModule R L M₂] (I J : LieIdeal R L)
/-- Given a Lie module `M` over a Lie algebra `L`, the set of Lie ideals of `L` acts on the set
of submodules of `M`. -/
instance hasBracket : Bracket (LieIdeal R L) (LieSubmodule R L M) :=
⟨fun I N => lieSpan R L { ⁅(x : L), (n : M)⁆ | (x : I) (n : N) }⟩
theorem lieIdeal_oper_eq_span :
⁅I, N⁆ = lieSpan R L { ⁅(x : L), (n : M)⁆ | (x : I) (n : N) } :=
rfl
/-- See also `LieSubmodule.lieIdeal_oper_eq_linear_span'` and
`LieSubmodule.lieIdeal_oper_eq_tensor_map_range`. -/
theorem lieIdeal_oper_eq_linear_span [LieModule R L M] :
(↑⁅I, N⁆ : Submodule R M) = Submodule.span R { ⁅(x : L), (n : M)⁆ | (x : I) (n : N) } := by
apply le_antisymm
· let s := { ⁅(x : L), (n : M)⁆ | (x : I) (n : N) }
have aux : ∀ (y : L), ∀ m' ∈ Submodule.span R s, ⁅y, m'⁆ ∈ Submodule.span R s := by
intro y m' hm'
refine Submodule.span_induction (R := R) (M := M) (s := s)
(p := fun m' _ ↦ ⁅y, m'⁆ ∈ Submodule.span R s) ?_ ?_ ?_ ?_ hm'
· rintro m'' ⟨x, n, hm''⟩; rw [← hm'', leibniz_lie]
refine Submodule.add_mem _ ?_ ?_ <;> apply Submodule.subset_span
· use ⟨⁅y, ↑x⁆, I.lie_mem x.property⟩, n
· use x, ⟨⁅y, ↑n⁆, N.lie_mem n.property⟩
· simp only [lie_zero, Submodule.zero_mem]
· intro m₁ m₂ _ _ hm₁ hm₂; rw [lie_add]; exact Submodule.add_mem _ hm₁ hm₂
· intro t m'' _ hm''; rw [lie_smul]; exact Submodule.smul_mem _ t hm''
change _ ≤ ({ Submodule.span R s with lie_mem := fun hm' => aux _ _ hm' } : LieSubmodule R L M)
rw [lieIdeal_oper_eq_span, lieSpan_le]
exact Submodule.subset_span
· rw [lieIdeal_oper_eq_span]; apply submodule_span_le_lieSpan
theorem lieIdeal_oper_eq_linear_span' [LieModule R L M] :
(↑⁅I, N⁆ : Submodule R M) = Submodule.span R { ⁅x, n⁆ | (x ∈ I) (n ∈ N) } := by
rw [lieIdeal_oper_eq_linear_span]
congr
ext m
constructor
· rintro ⟨⟨x, hx⟩, ⟨n, hn⟩, rfl⟩
exact ⟨x, hx, n, hn, rfl⟩
· rintro ⟨x, hx, n, hn, rfl⟩
exact ⟨⟨x, hx⟩, ⟨n, hn⟩, rfl⟩
theorem lie_le_iff : ⁅I, N⁆ ≤ N' ↔ ∀ x ∈ I, ∀ m ∈ N, ⁅x, m⁆ ∈ N' := by
rw [lieIdeal_oper_eq_span, LieSubmodule.lieSpan_le]
refine ⟨fun h x hx m hm => h ⟨⟨x, hx⟩, ⟨m, hm⟩, rfl⟩, ?_⟩
rintro h _ ⟨⟨x, hx⟩, ⟨m, hm⟩, rfl⟩
exact h x hx m hm
variable {N I} in
theorem lie_coe_mem_lie (x : I) (m : N) : ⁅(x : L), (m : M)⁆ ∈ ⁅I, N⁆ := by
rw [lieIdeal_oper_eq_span]; apply subset_lieSpan; use x, m
variable {N I} in
theorem lie_mem_lie {x : L} {m : M} (hx : x ∈ I) (hm : m ∈ N) : ⁅x, m⁆ ∈ ⁅I, N⁆ :=
lie_coe_mem_lie ⟨x, hx⟩ ⟨m, hm⟩
theorem lie_comm : ⁅I, J⁆ = ⁅J, I⁆ := by
suffices ∀ I J : LieIdeal R L, ⁅I, J⁆ ≤ ⁅J, I⁆ by exact le_antisymm (this I J) (this J I)
clear! I J; intro I J
rw [lieIdeal_oper_eq_span, lieSpan_le]; rintro x ⟨y, z, h⟩; rw [← h]
rw [← lie_skew, ← lie_neg, ← LieSubmodule.coe_neg]
apply lie_coe_mem_lie
theorem lie_le_right : ⁅I, N⁆ ≤ N := by
rw [lieIdeal_oper_eq_span, lieSpan_le]; rintro m ⟨x, n, hn⟩; rw [← hn]
exact N.lie_mem n.property
theorem lie_le_left : ⁅I, J⁆ ≤ I := by rw [lie_comm]; exact lie_le_right I J
theorem lie_le_inf : ⁅I, J⁆ ≤ I ⊓ J := by rw [le_inf_iff]; exact ⟨lie_le_left I J, lie_le_right J I⟩
@[simp]
theorem lie_bot : ⁅I, (⊥ : LieSubmodule R L M)⁆ = ⊥ := by rw [eq_bot_iff]; apply lie_le_right
@[simp]
theorem bot_lie : ⁅(⊥ : LieIdeal R L), N⁆ = ⊥ := by
suffices ⁅(⊥ : LieIdeal R L), N⁆ ≤ ⊥ by exact le_bot_iff.mp this
rw [lieIdeal_oper_eq_span, lieSpan_le]; rintro m ⟨⟨x, hx⟩, n, hn⟩; rw [← hn]
change x ∈ (⊥ : LieIdeal R L) at hx; rw [mem_bot] at hx; simp [hx]
theorem lie_eq_bot_iff : ⁅I, N⁆ = ⊥ ↔ ∀ x ∈ I, ∀ m ∈ N, ⁅(x : L), m⁆ = 0 := by
rw [lieIdeal_oper_eq_span, LieSubmodule.lieSpan_eq_bot_iff]
refine ⟨fun h x hx m hm => h ⁅x, m⁆ ⟨⟨x, hx⟩, ⟨m, hm⟩, rfl⟩, ?_⟩
rintro h - ⟨⟨x, hx⟩, ⟨⟨n, hn⟩, rfl⟩⟩
exact h x hx n hn
variable {I J N N'} in
theorem mono_lie (h₁ : I ≤ J) (h₂ : N ≤ N') : ⁅I, N⁆ ≤ ⁅J, N'⁆ := by
intro m h
rw [lieIdeal_oper_eq_span, mem_lieSpan] at h; rw [lieIdeal_oper_eq_span, mem_lieSpan]
intro N hN; apply h; rintro m' ⟨⟨x, hx⟩, ⟨n, hn⟩, hm⟩; rw [← hm]; apply hN
use ⟨x, h₁ hx⟩, ⟨n, h₂ hn⟩
variable {I J} in
theorem mono_lie_left (h : I ≤ J) : ⁅I, N⁆ ≤ ⁅J, N⁆ :=
mono_lie h (le_refl N)
variable {N N'} in
theorem mono_lie_right (h : N ≤ N') : ⁅I, N⁆ ≤ ⁅I, N'⁆ :=
mono_lie (le_refl I) h
@[simp]
theorem lie_sup : ⁅I, N ⊔ N'⁆ = ⁅I, N⁆ ⊔ ⁅I, N'⁆ := by
have h : ⁅I, N⁆ ⊔ ⁅I, N'⁆ ≤ ⁅I, N ⊔ N'⁆ := by
rw [sup_le_iff]; constructor <;>
apply mono_lie_right <;> [exact le_sup_left; exact le_sup_right]
suffices ⁅I, N ⊔ N'⁆ ≤ ⁅I, N⁆ ⊔ ⁅I, N'⁆ by exact le_antisymm this h
rw [lieIdeal_oper_eq_span, lieSpan_le]
rintro m ⟨x, ⟨n, hn⟩, h⟩
simp only [SetLike.mem_coe]
rw [LieSubmodule.mem_sup] at hn ⊢
rcases hn with ⟨n₁, hn₁, n₂, hn₂, hn'⟩
use ⁅(x : L), (⟨n₁, hn₁⟩ : N)⁆; constructor; · apply lie_coe_mem_lie
use ⁅(x : L), (⟨n₂, hn₂⟩ : N')⁆; constructor; · apply lie_coe_mem_lie
simp [← h, ← hn']
@[simp]
theorem sup_lie : ⁅I ⊔ J, N⁆ = ⁅I, N⁆ ⊔ ⁅J, N⁆ := by
have h : ⁅I, N⁆ ⊔ ⁅J, N⁆ ≤ ⁅I ⊔ J, N⁆ := by
rw [sup_le_iff]; constructor <;>
apply mono_lie_left <;> [exact le_sup_left; exact le_sup_right]
suffices ⁅I ⊔ J, N⁆ ≤ ⁅I, N⁆ ⊔ ⁅J, N⁆ by exact le_antisymm this h
rw [lieIdeal_oper_eq_span, lieSpan_le]
rintro m ⟨⟨x, hx⟩, n, h⟩
simp only [SetLike.mem_coe]
rw [LieSubmodule.mem_sup] at hx ⊢
rcases hx with ⟨x₁, hx₁, x₂, hx₂, hx'⟩
use ⁅((⟨x₁, hx₁⟩ : I) : L), (n : N)⁆; constructor; · apply lie_coe_mem_lie
use ⁅((⟨x₂, hx₂⟩ : J) : L), (n : N)⁆; constructor; · apply lie_coe_mem_lie
simp [← h, ← hx']
theorem lie_inf : ⁅I, N ⊓ N'⁆ ≤ ⁅I, N⁆ ⊓ ⁅I, N'⁆ := by
rw [le_inf_iff]; constructor <;>
apply mono_lie_right <;> [exact inf_le_left; exact inf_le_right]
theorem inf_lie : ⁅I ⊓ J, N⁆ ≤ ⁅I, N⁆ ⊓ ⁅J, N⁆ := by
rw [le_inf_iff]; constructor <;>
apply mono_lie_left <;> [exact inf_le_left; exact inf_le_right]
theorem map_bracket_eq [LieModule R L M] : map f ⁅I, N⁆ = ⁅I, map f N⁆ := by
rw [← toSubmodule_inj, toSubmodule_map, lieIdeal_oper_eq_linear_span,
lieIdeal_oper_eq_linear_span, Submodule.map_span]
congr
ext m
constructor
· rintro ⟨-, ⟨⟨x, ⟨n, hn⟩, rfl⟩, hm⟩⟩
simp only [LieModuleHom.coe_toLinearMap, LieModuleHom.map_lie] at hm
exact ⟨x, ⟨f n, (mem_map (f n)).mpr ⟨n, hn, rfl⟩⟩, hm⟩
· rintro ⟨x, ⟨m₂, hm₂ : m₂ ∈ map f N⟩, rfl⟩
obtain ⟨n, hn, rfl⟩ := (mem_map m₂).mp hm₂
exact ⟨⁅x, n⁆, ⟨x, ⟨n, hn⟩, rfl⟩, by simp⟩
theorem comap_bracket_eq [LieModule R L M] (hf₁ : f.ker = ⊥) (hf₂ : N₂ ≤ f.range) :
comap f ⁅I, N₂⁆ = ⁅I, comap f N₂⁆ := by
conv_lhs => rw [← map_comap_eq N₂ f hf₂]
rw [← map_bracket_eq, comap_map_eq _ f hf₁]
end LieIdealOperations
end LieSubmodule
namespace LieIdeal
open LieAlgebra
variable {R : Type u} {L : Type v} {L' : Type w₂}
variable [CommRing R] [LieRing L] [LieAlgebra R L] [LieRing L'] [LieAlgebra R L']
variable (f : L →ₗ⁅R⁆ L') (I : LieIdeal R L) (J : LieIdeal R L')
/-- Note that the inequality can be strict; e.g., the inclusion of an Abelian subalgebra of a
simple algebra. -/
theorem map_bracket_le {I₁ I₂ : LieIdeal R L} : map f ⁅I₁, I₂⁆ ≤ ⁅map f I₁, map f I₂⁆ := by
rw [map_le_iff_le_comap, LieSubmodule.lieIdeal_oper_eq_span, LieSubmodule.lieSpan_le]
intro x hx
obtain ⟨⟨y₁, hy₁⟩, ⟨y₂, hy₂⟩, hx⟩ := hx
rw [← hx]
let fy₁ : ↥(map f I₁) := ⟨f y₁, mem_map hy₁⟩
let fy₂ : ↥(map f I₂) := ⟨f y₂, mem_map hy₂⟩
change _ ∈ comap f ⁅map f I₁, map f I₂⁆
simp only [Submodule.coe_mk, mem_comap, LieHom.map_lie]
exact LieSubmodule.lie_coe_mem_lie fy₁ fy₂
theorem map_bracket_eq {I₁ I₂ : LieIdeal R L} (h : Function.Surjective f) :
map f ⁅I₁, I₂⁆ = ⁅map f I₁, map f I₂⁆ := by
suffices ⁅map f I₁, map f I₂⁆ ≤ map f ⁅I₁, I₂⁆ by exact le_antisymm (map_bracket_le f) this
rw [← LieSubmodule.toSubmodule_le_toSubmodule, coe_map_of_surjective h,
LieSubmodule.lieIdeal_oper_eq_linear_span, LieSubmodule.lieIdeal_oper_eq_linear_span,
LinearMap.map_span]
apply Submodule.span_mono
rintro x ⟨⟨z₁, h₁⟩, ⟨z₂, h₂⟩, rfl⟩
obtain ⟨y₁, rfl⟩ := mem_map_of_surjective h h₁
obtain ⟨y₂, rfl⟩ := mem_map_of_surjective h h₂
exact ⟨⁅(y₁ : L), (y₂ : L)⁆, ⟨y₁, y₂, rfl⟩, by apply f.map_lie⟩
theorem comap_bracket_le {J₁ J₂ : LieIdeal R L'} : ⁅comap f J₁, comap f J₂⁆ ≤ comap f ⁅J₁, J₂⁆ := by
rw [← map_le_iff_le_comap]
exact le_trans (map_bracket_le f) (LieSubmodule.mono_lie map_comap_le map_comap_le)
variable {f}
theorem map_comap_incl {I₁ I₂ : LieIdeal R L} : map I₁.incl (comap I₁.incl I₂) = I₁ ⊓ I₂ := by
conv_rhs => rw [← I₁.incl_idealRange]
rw [← map_comap_eq]
exact I₁.incl_isIdealMorphism
theorem comap_bracket_eq {J₁ J₂ : LieIdeal R L'} (h : f.IsIdealMorphism) :
comap f ⁅f.idealRange ⊓ J₁, f.idealRange ⊓ J₂⁆ = ⁅comap f J₁, comap f J₂⁆ ⊔ f.ker := by
rw [← LieSubmodule.toSubmodule_inj, comap_toSubmodule,
LieSubmodule.sup_toSubmodule, f.ker_toSubmodule, ← Submodule.comap_map_eq,
LieSubmodule.lieIdeal_oper_eq_linear_span, LieSubmodule.lieIdeal_oper_eq_linear_span,
LinearMap.map_span]
congr; simp only [LieHom.coe_toLinearMap, Set.mem_setOf_eq]; ext y
constructor
· rintro ⟨⟨x₁, hx₁⟩, ⟨x₂, hx₂⟩, hy⟩; rw [← hy]
rw [LieSubmodule.mem_inf, f.mem_idealRange_iff h] at hx₁ hx₂
obtain ⟨⟨z₁, hz₁⟩, hz₁'⟩ := hx₁; rw [← hz₁] at hz₁'
obtain ⟨⟨z₂, hz₂⟩, hz₂'⟩ := hx₂; rw [← hz₂] at hz₂'
refine ⟨⁅z₁, z₂⁆, ⟨⟨z₁, hz₁'⟩, ⟨z₂, hz₂'⟩, rfl⟩, ?_⟩
simp only [hz₁, hz₂, Submodule.coe_mk, LieHom.map_lie]
· rintro ⟨x, ⟨⟨z₁, hz₁⟩, ⟨z₂, hz₂⟩, hx⟩, hy⟩; rw [← hy, ← hx]
have hz₁' : f z₁ ∈ f.idealRange ⊓ J₁ := by
rw [LieSubmodule.mem_inf]; exact ⟨f.mem_idealRange z₁, hz₁⟩
have hz₂' : f z₂ ∈ f.idealRange ⊓ J₂ := by
rw [LieSubmodule.mem_inf]; exact ⟨f.mem_idealRange z₂, hz₂⟩
use ⟨f z₁, hz₁'⟩, ⟨f z₂, hz₂'⟩; simp only [Submodule.coe_mk, LieHom.map_lie]
theorem map_comap_bracket_eq {J₁ J₂ : LieIdeal R L'} (h : f.IsIdealMorphism) :
map f ⁅comap f J₁, comap f J₂⁆ = ⁅f.idealRange ⊓ J₁, f.idealRange ⊓ J₂⁆ := by
rw [← map_sup_ker_eq_map, ← comap_bracket_eq h, map_comap_eq h, inf_eq_right]
exact le_trans (LieSubmodule.lie_le_left _ _) inf_le_left
theorem comap_bracket_incl {I₁ I₂ : LieIdeal R L} :
⁅comap I.incl I₁, comap I.incl I₂⁆ = comap I.incl ⁅I ⊓ I₁, I ⊓ I₂⁆ := by
conv_rhs =>
congr
next => skip
rw [← I.incl_idealRange]
rw [comap_bracket_eq]
· simp only [ker_incl, sup_bot_eq]
· exact I.incl_isIdealMorphism
/-- This is a very useful result; it allows us to use the fact that inclusion distributes over the
Lie bracket operation on ideals, subject to the conditions shown. -/
theorem comap_bracket_incl_of_le {I₁ I₂ : LieIdeal R L} (h₁ : I₁ ≤ I) (h₂ : I₂ ≤ I) :
⁅comap I.incl I₁, comap I.incl I₂⁆ = comap I.incl ⁅I₁, I₂⁆ := by
rw [comap_bracket_incl]; rw [← inf_eq_right] at h₁ h₂; rw [h₁, h₂]
end LieIdeal
| Mathlib/Algebra/Lie/IdealOperations.lean | 319 | 322 | |
/-
Copyright (c) 2020 Joseph Myers. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Joseph Myers, Manuel Candales
-/
import Mathlib.Analysis.Convex.Between
import Mathlib.Analysis.Normed.Group.AddTorsor
import Mathlib.Geometry.Euclidean.Angle.Unoriented.Basic
import Mathlib.Analysis.Normed.Affine.Isometry
/-!
# Angles between points
This file defines unoriented angles in Euclidean affine spaces.
## Main definitions
* `EuclideanGeometry.angle`, with notation `∠`, is the undirected angle determined by three
points.
## TODO
Prove the triangle inequality for the angle.
-/
noncomputable section
open Real RealInnerProductSpace
namespace EuclideanGeometry
open InnerProductGeometry
variable {V P : Type*} [NormedAddCommGroup V] [InnerProductSpace ℝ V] [MetricSpace P]
[NormedAddTorsor V P] {p p₀ : P}
/-- The undirected angle at `p₂` between the line segments to `p₁` and
`p₃`. If either of those points equals `p₂`, this is π/2. Use
`open scoped EuclideanGeometry` to access the `∠ p₁ p₂ p₃`
notation. -/
nonrec def angle (p₁ p₂ p₃ : P) : ℝ :=
angle (p₁ -ᵥ p₂ : V) (p₃ -ᵥ p₂)
@[inherit_doc] scoped notation "∠" => EuclideanGeometry.angle
theorem continuousAt_angle {x : P × P × P} (hx12 : x.1 ≠ x.2.1) (hx32 : x.2.2 ≠ x.2.1) :
ContinuousAt (fun y : P × P × P => ∠ y.1 y.2.1 y.2.2) x := by
let f : P × P × P → V × V := fun y => (y.1 -ᵥ y.2.1, y.2.2 -ᵥ y.2.1)
have hf1 : (f x).1 ≠ 0 := by simp [f, hx12]
have hf2 : (f x).2 ≠ 0 := by simp [f, hx32]
exact (InnerProductGeometry.continuousAt_angle hf1 hf2).comp (by fun_prop)
@[simp]
theorem _root_.AffineIsometry.angle_map {V₂ P₂ : Type*} [NormedAddCommGroup V₂]
[InnerProductSpace ℝ V₂] [MetricSpace P₂] [NormedAddTorsor V₂ P₂]
(f : P →ᵃⁱ[ℝ] P₂) (p₁ p₂ p₃ : P) : ∠ (f p₁) (f p₂) (f p₃) = ∠ p₁ p₂ p₃ := by
simp_rw [angle, ← AffineIsometry.map_vsub, LinearIsometry.angle_map]
@[simp, norm_cast]
theorem _root_.AffineSubspace.angle_coe {s : AffineSubspace ℝ P} (p₁ p₂ p₃ : s) :
haveI : Nonempty s := ⟨p₁⟩
∠ (p₁ : P) (p₂ : P) (p₃ : P) = ∠ p₁ p₂ p₃ :=
haveI : Nonempty s := ⟨p₁⟩
s.subtypeₐᵢ.angle_map p₁ p₂ p₃
/-- Angles are translation invariant -/
@[simp]
theorem angle_const_vadd (v : V) (p₁ p₂ p₃ : P) : ∠ (v +ᵥ p₁) (v +ᵥ p₂) (v +ᵥ p₃) = ∠ p₁ p₂ p₃ :=
(AffineIsometryEquiv.constVAdd ℝ P v).toAffineIsometry.angle_map _ _ _
/-- Angles are translation invariant -/
@[simp]
theorem angle_vadd_const (v₁ v₂ v₃ : V) (p : P) : ∠ (v₁ +ᵥ p) (v₂ +ᵥ p) (v₃ +ᵥ p) = ∠ v₁ v₂ v₃ :=
(AffineIsometryEquiv.vaddConst ℝ p).toAffineIsometry.angle_map _ _ _
/-- Angles are translation invariant -/
@[simp]
theorem angle_const_vsub (p p₁ p₂ p₃ : P) : ∠ (p -ᵥ p₁) (p -ᵥ p₂) (p -ᵥ p₃) = ∠ p₁ p₂ p₃ :=
(AffineIsometryEquiv.constVSub ℝ p).toAffineIsometry.angle_map _ _ _
/-- Angles are translation invariant -/
@[simp]
theorem angle_vsub_const (p₁ p₂ p₃ p : P) : ∠ (p₁ -ᵥ p) (p₂ -ᵥ p) (p₃ -ᵥ p) = ∠ p₁ p₂ p₃ :=
(AffineIsometryEquiv.vaddConst ℝ p).symm.toAffineIsometry.angle_map _ _ _
/-- Angles in a vector space are translation invariant -/
@[simp]
theorem angle_add_const (v₁ v₂ v₃ : V) (v : V) : ∠ (v₁ + v) (v₂ + v) (v₃ + v) = ∠ v₁ v₂ v₃ :=
angle_vadd_const _ _ _ _
/-- Angles in a vector space are translation invariant -/
@[simp]
theorem angle_const_add (v : V) (v₁ v₂ v₃ : V) : ∠ (v + v₁) (v + v₂) (v + v₃) = ∠ v₁ v₂ v₃ :=
angle_const_vadd _ _ _ _
/-- Angles in a vector space are translation invariant -/
@[simp]
theorem angle_sub_const (v₁ v₂ v₃ : V) (v : V) : ∠ (v₁ - v) (v₂ - v) (v₃ - v) = ∠ v₁ v₂ v₃ := by
simpa only [vsub_eq_sub] using angle_vsub_const v₁ v₂ v₃ v
/-- Angles in a vector space are invariant to inversion -/
@[simp]
theorem angle_const_sub (v : V) (v₁ v₂ v₃ : V) : ∠ (v - v₁) (v - v₂) (v - v₃) = ∠ v₁ v₂ v₃ := by
simpa only [vsub_eq_sub] using angle_const_vsub v v₁ v₂ v₃
/-- Angles in a vector space are invariant to inversion -/
@[simp]
theorem angle_neg (v₁ v₂ v₃ : V) : ∠ (-v₁) (-v₂) (-v₃) = ∠ v₁ v₂ v₃ := by
simpa only [zero_sub] using angle_const_sub 0 v₁ v₂ v₃
/-- The angle at a point does not depend on the order of the other two
points. -/
nonrec theorem angle_comm (p₁ p₂ p₃ : P) : ∠ p₁ p₂ p₃ = ∠ p₃ p₂ p₁ :=
angle_comm _ _
/-- The angle at a point is nonnegative. -/
nonrec theorem angle_nonneg (p₁ p₂ p₃ : P) : 0 ≤ ∠ p₁ p₂ p₃ :=
angle_nonneg _ _
/-- The angle at a point is at most π. -/
nonrec theorem angle_le_pi (p₁ p₂ p₃ : P) : ∠ p₁ p₂ p₃ ≤ π :=
angle_le_pi _ _
/-- The angle ∠AAB at a point is always `π / 2`. -/
@[simp] lemma angle_self_left (p₀ p : P) : ∠ p₀ p₀ p = π / 2 := by
unfold angle
rw [vsub_self]
exact angle_zero_left _
/-- The angle ∠ABB at a point is always `π / 2`. -/
@[simp] lemma angle_self_right (p₀ p : P) : ∠ p p₀ p₀ = π / 2 := by rw [angle_comm, angle_self_left]
/-- The angle ∠ABA at a point is `0`, unless `A = B`. -/
theorem angle_self_of_ne (h : p ≠ p₀) : ∠ p p₀ p = 0 := angle_self <| vsub_ne_zero.2 h
/-- If the angle ∠ABC at a point is π, the angle ∠BAC is 0. -/
theorem angle_eq_zero_of_angle_eq_pi_left {p₁ p₂ p₃ : P} (h : ∠ p₁ p₂ p₃ = π) : ∠ p₂ p₁ p₃ = 0 := by
unfold angle at h
rw [angle_eq_pi_iff] at h
rcases h with ⟨hp₁p₂, ⟨r, ⟨hr, hpr⟩⟩⟩
unfold angle
rw [angle_eq_zero_iff]
rw [← neg_vsub_eq_vsub_rev, neg_ne_zero] at hp₁p₂
use hp₁p₂, -r + 1, add_pos (neg_pos_of_neg hr) zero_lt_one
rw [add_smul, ← neg_vsub_eq_vsub_rev p₁ p₂, smul_neg]
simp [← hpr]
/-- If the angle ∠ABC at a point is π, the angle ∠BCA is 0. -/
theorem angle_eq_zero_of_angle_eq_pi_right {p₁ p₂ p₃ : P} (h : ∠ p₁ p₂ p₃ = π) :
∠ p₂ p₃ p₁ = 0 := by
rw [angle_comm] at h
exact angle_eq_zero_of_angle_eq_pi_left h
/-- If ∠BCD = π, then ∠ABC = ∠ABD. -/
theorem angle_eq_angle_of_angle_eq_pi (p₁ : P) {p₂ p₃ p₄ : P} (h : ∠ p₂ p₃ p₄ = π) :
∠ p₁ p₂ p₃ = ∠ p₁ p₂ p₄ := by
unfold angle at *
rcases angle_eq_pi_iff.1 h with ⟨_, ⟨r, ⟨hr, hpr⟩⟩⟩
rw [eq_comm]
convert angle_smul_right_of_pos (p₁ -ᵥ p₂) (p₃ -ᵥ p₂) (add_pos (neg_pos_of_neg hr) zero_lt_one)
rw [add_smul, ← neg_vsub_eq_vsub_rev p₂ p₃, smul_neg, neg_smul, ← hpr]
simp
/-- If ∠BCD = π, then ∠ACB + ∠ACD = π. -/
nonrec theorem angle_add_angle_eq_pi_of_angle_eq_pi (p₁ : P) {p₂ p₃ p₄ : P} (h : ∠ p₂ p₃ p₄ = π) :
∠ p₁ p₃ p₂ + ∠ p₁ p₃ p₄ = π := by
unfold angle at h
rw [angle_comm p₁ p₃ p₂, angle_comm p₁ p₃ p₄]
unfold angle
exact angle_add_angle_eq_pi_of_angle_eq_pi _ h
/-- **Vertical Angles Theorem**: angles opposite each other, formed by two intersecting straight
lines, are equal. -/
theorem angle_eq_angle_of_angle_eq_pi_of_angle_eq_pi {p₁ p₂ p₃ p₄ p₅ : P} (hapc : ∠ p₁ p₅ p₃ = π)
(hbpd : ∠ p₂ p₅ p₄ = π) : ∠ p₁ p₅ p₂ = ∠ p₃ p₅ p₄ := by
linarith [angle_add_angle_eq_pi_of_angle_eq_pi p₁ hbpd, angle_comm p₄ p₅ p₁,
angle_add_angle_eq_pi_of_angle_eq_pi p₄ hapc, angle_comm p₄ p₅ p₃]
/-- If ∠ABC = π then dist A B ≠ 0. -/
theorem left_dist_ne_zero_of_angle_eq_pi {p₁ p₂ p₃ : P} (h : ∠ p₁ p₂ p₃ = π) : dist p₁ p₂ ≠ 0 := by
by_contra heq
rw [dist_eq_zero] at heq
| rw [heq, angle_self_left] at h
exact Real.pi_ne_zero (by linarith)
/-- If ∠ABC = π then dist C B ≠ 0. -/
theorem right_dist_ne_zero_of_angle_eq_pi {p₁ p₂ p₃ : P} (h : ∠ p₁ p₂ p₃ = π) : dist p₃ p₂ ≠ 0 :=
left_dist_ne_zero_of_angle_eq_pi <| (angle_comm _ _ _).trans h
/-- If ∠ABC = π, then (dist A C) = (dist A B) + (dist B C). -/
| Mathlib/Geometry/Euclidean/Angle/Unoriented/Affine.lean | 185 | 192 |
/-
Copyright (c) 2021 Yury Kudryashov. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Yury Kudryashov
-/
import Mathlib.Analysis.BoxIntegral.Partition.Basic
/-!
# Split a box along one or more hyperplanes
## Main definitions
A hyperplane `{x : ι → ℝ | x i = a}` splits a rectangular box `I : BoxIntegral.Box ι` into two
smaller boxes. If `a ∉ Ioo (I.lower i, I.upper i)`, then one of these boxes is empty, so it is not a
box in the sense of `BoxIntegral.Box`.
We introduce the following definitions.
* `BoxIntegral.Box.splitLower I i a` and `BoxIntegral.Box.splitUpper I i a` are these boxes (as
`WithBot (BoxIntegral.Box ι)`);
* `BoxIntegral.Prepartition.split I i a` is the partition of `I` made of these two boxes (or of one
box `I` if one of these boxes is empty);
* `BoxIntegral.Prepartition.splitMany I s`, where `s : Finset (ι × ℝ)` is a finite set of
hyperplanes `{x : ι → ℝ | x i = a}` encoded as pairs `(i, a)`, is the partition of `I` made by
cutting it along all the hyperplanes in `s`.
## Main results
The main result `BoxIntegral.Prepartition.exists_iUnion_eq_diff` says that any prepartition `π` of
`I` admits a prepartition `π'` of `I` that covers exactly `I \ π.iUnion`. One of these prepartitions
is available as `BoxIntegral.Prepartition.compl`.
## Tags
rectangular box, partition, hyperplane
-/
noncomputable section
open Function Set Filter
namespace BoxIntegral
variable {ι M : Type*} {n : ℕ}
namespace Box
variable {I : Box ι} {i : ι} {x : ℝ} {y : ι → ℝ}
open scoped Classical in
/-- Given a box `I` and `x ∈ (I.lower i, I.upper i)`, the hyperplane `{y : ι → ℝ | y i = x}` splits
`I` into two boxes. `BoxIntegral.Box.splitLower I i x` is the box `I ∩ {y | y i ≤ x}`
(if it is nonempty). As usual, we represent a box that may be empty as
`WithBot (BoxIntegral.Box ι)`. -/
def splitLower (I : Box ι) (i : ι) (x : ℝ) : WithBot (Box ι) :=
mk' I.lower (update I.upper i (min x (I.upper i)))
@[simp]
theorem coe_splitLower : (splitLower I i x : Set (ι → ℝ)) = ↑I ∩ { y | y i ≤ x } := by
rw [splitLower, coe_mk']
ext y
simp only [mem_univ_pi, mem_Ioc, mem_inter_iff, mem_coe, mem_setOf_eq, forall_and, ← Pi.le_def,
le_update_iff, le_min_iff, and_assoc, and_forall_ne (p := fun j => y j ≤ upper I j) i, mem_def]
rw [and_comm (a := y i ≤ x)]
|
theorem splitLower_le : I.splitLower i x ≤ I :=
withBotCoe_subset_iff.1 <| by simp
@[simp]
theorem splitLower_eq_bot {i x} : I.splitLower i x = ⊥ ↔ x ≤ I.lower i := by
| Mathlib/Analysis/BoxIntegral/Partition/Split.lean | 65 | 70 |
/-
Copyright (c) 2018 Robert Y. Lewis. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Robert Y. Lewis, Chris Hughes, Daniel Weber
-/
import Batteries.Data.Nat.Gcd
import Mathlib.Algebra.GroupWithZero.Associated
import Mathlib.Algebra.Ring.Divisibility.Basic
import Mathlib.Algebra.Ring.Int.Defs
import Mathlib.Data.ENat.Basic
import Mathlib.Algebra.BigOperators.Group.Finset.Basic
/-!
# Multiplicity of a divisor
For a commutative monoid, this file introduces the notion of multiplicity of a divisor and proves
several basic results on it.
## Main definitions
* `emultiplicity a b`: for two elements `a` and `b` of a commutative monoid returns the largest
number `n` such that `a ^ n ∣ b` or infinity, written `⊤`, if `a ^ n ∣ b` for all natural numbers
`n`.
* `multiplicity a b`: a `ℕ`-valued version of `multiplicity`, defaulting for `1` instead of `⊤`.
The reason for using `1` as a default value instead of `0` is to have `multiplicity_eq_zero_iff`.
* `FiniteMultiplicity a b`: a predicate denoting that the multiplicity of `a` in `b` is finite.
-/
assert_not_exists Field
variable {α β : Type*}
open Nat
/-- `multiplicity.Finite a b` indicates that the multiplicity of `a` in `b` is finite. -/
abbrev FiniteMultiplicity [Monoid α] (a b : α) : Prop :=
∃ n : ℕ, ¬a ^ (n + 1) ∣ b
@[deprecated (since := "2024-11-30")] alias multiplicity.Finite := FiniteMultiplicity
open scoped Classical in
/-- `emultiplicity a b` returns the largest natural number `n` such that
`a ^ n ∣ b`, as an `ℕ∞`. If `∀ n, a ^ n ∣ b` then it returns `⊤`. -/
noncomputable def emultiplicity [Monoid α] (a b : α) : ℕ∞ :=
if h : FiniteMultiplicity a b then Nat.find h else ⊤
/-- A `ℕ`-valued version of `emultiplicity`, returning `1` instead of `⊤`. -/
noncomputable def multiplicity [Monoid α] (a b : α) : ℕ :=
(emultiplicity a b).untopD 1
section Monoid
variable [Monoid α] [Monoid β] {a b : α}
@[simp]
theorem emultiplicity_eq_top :
emultiplicity a b = ⊤ ↔ ¬FiniteMultiplicity a b := by
simp [emultiplicity]
theorem emultiplicity_lt_top {a b : α} : emultiplicity a b < ⊤ ↔ FiniteMultiplicity a b := by
simp [lt_top_iff_ne_top, emultiplicity_eq_top]
theorem finiteMultiplicity_iff_emultiplicity_ne_top :
FiniteMultiplicity a b ↔ emultiplicity a b ≠ ⊤ := by simp
@[deprecated (since := "2024-11-30")]
alias finite_iff_emultiplicity_ne_top := finiteMultiplicity_iff_emultiplicity_ne_top
alias ⟨FiniteMultiplicity.emultiplicity_ne_top, _⟩ := finite_iff_emultiplicity_ne_top
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.emultiplicity_ne_top := FiniteMultiplicity.emultiplicity_ne_top
@[deprecated (since := "2024-11-08")]
alias Finite.emultiplicity_ne_top := FiniteMultiplicity.emultiplicity_ne_top
theorem finiteMultiplicity_of_emultiplicity_eq_natCast {n : ℕ} (h : emultiplicity a b = n) :
FiniteMultiplicity a b := by
by_contra! nh
rw [← emultiplicity_eq_top, h] at nh
trivial
@[deprecated (since := "2024-11-30")]
alias finite_of_emultiplicity_eq_natCast := finiteMultiplicity_of_emultiplicity_eq_natCast
theorem multiplicity_eq_of_emultiplicity_eq_some {n : ℕ} (h : emultiplicity a b = n) :
multiplicity a b = n := by
simp [multiplicity, h]
rfl
theorem emultiplicity_ne_of_multiplicity_ne {n : ℕ} :
multiplicity a b ≠ n → emultiplicity a b ≠ n :=
mt multiplicity_eq_of_emultiplicity_eq_some
theorem FiniteMultiplicity.emultiplicity_eq_multiplicity (h : FiniteMultiplicity a b) :
emultiplicity a b = multiplicity a b := by
cases hm : emultiplicity a b
· simp [h] at hm
rw [multiplicity_eq_of_emultiplicity_eq_some hm]
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.emultiplicity_eq_multiplicity :=
FiniteMultiplicity.emultiplicity_eq_multiplicity
theorem FiniteMultiplicity.emultiplicity_eq_iff_multiplicity_eq {n : ℕ}
(h : FiniteMultiplicity a b) : emultiplicity a b = n ↔ multiplicity a b = n := by
simp [h.emultiplicity_eq_multiplicity]
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.emultiplicity_eq_iff_multiplicity_eq :=
FiniteMultiplicity.emultiplicity_eq_iff_multiplicity_eq
theorem emultiplicity_eq_iff_multiplicity_eq_of_ne_one {n : ℕ} (h : n ≠ 1) :
emultiplicity a b = n ↔ multiplicity a b = n := by
constructor
· exact multiplicity_eq_of_emultiplicity_eq_some
· intro h₂
simpa [multiplicity, WithTop.untopD_eq_iff, h] using h₂
theorem emultiplicity_eq_zero_iff_multiplicity_eq_zero :
emultiplicity a b = 0 ↔ multiplicity a b = 0 :=
emultiplicity_eq_iff_multiplicity_eq_of_ne_one zero_ne_one
@[simp]
theorem multiplicity_eq_one_of_not_finiteMultiplicity (h : ¬FiniteMultiplicity a b) :
multiplicity a b = 1 := by
simp [multiplicity, emultiplicity_eq_top.2 h]
@[deprecated (since := "2024-11-30")]
alias multiplicity_eq_one_of_not_finite :=
multiplicity_eq_one_of_not_finiteMultiplicity
@[simp]
theorem multiplicity_le_emultiplicity :
multiplicity a b ≤ emultiplicity a b := by
by_cases hf : FiniteMultiplicity a b
· simp [hf.emultiplicity_eq_multiplicity]
· simp [hf, emultiplicity_eq_top.2]
@[simp]
theorem multiplicity_eq_of_emultiplicity_eq {c d : β}
(h : emultiplicity a b = emultiplicity c d) : multiplicity a b = multiplicity c d := by
unfold multiplicity
rw [h]
theorem multiplicity_le_of_emultiplicity_le {n : ℕ} (h : emultiplicity a b ≤ n) :
multiplicity a b ≤ n := by
exact_mod_cast multiplicity_le_emultiplicity.trans h
theorem FiniteMultiplicity.emultiplicity_le_of_multiplicity_le (hfin : FiniteMultiplicity a b)
{n : ℕ} (h : multiplicity a b ≤ n) : emultiplicity a b ≤ n := by
rw [emultiplicity_eq_multiplicity hfin]
assumption_mod_cast
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.emultiplicity_le_of_multiplicity_le :=
FiniteMultiplicity.emultiplicity_le_of_multiplicity_le
theorem le_emultiplicity_of_le_multiplicity {n : ℕ} (h : n ≤ multiplicity a b) :
n ≤ emultiplicity a b := by
exact_mod_cast (WithTop.coe_mono h).trans multiplicity_le_emultiplicity
theorem FiniteMultiplicity.le_multiplicity_of_le_emultiplicity (hfin : FiniteMultiplicity a b)
{n : ℕ} (h : n ≤ emultiplicity a b) : n ≤ multiplicity a b := by
rw [emultiplicity_eq_multiplicity hfin] at h
assumption_mod_cast
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.le_multiplicity_of_le_emultiplicity :=
FiniteMultiplicity.le_multiplicity_of_le_emultiplicity
theorem multiplicity_lt_of_emultiplicity_lt {n : ℕ} (h : emultiplicity a b < n) :
multiplicity a b < n := by
exact_mod_cast multiplicity_le_emultiplicity.trans_lt h
theorem FiniteMultiplicity.emultiplicity_lt_of_multiplicity_lt (hfin : FiniteMultiplicity a b)
{n : ℕ} (h : multiplicity a b < n) : emultiplicity a b < n := by
rw [emultiplicity_eq_multiplicity hfin]
assumption_mod_cast
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.emultiplicity_lt_of_multiplicity_lt :=
FiniteMultiplicity.emultiplicity_lt_of_multiplicity_lt
theorem lt_emultiplicity_of_lt_multiplicity {n : ℕ} (h : n < multiplicity a b) :
n < emultiplicity a b := by
exact_mod_cast (WithTop.coe_strictMono h).trans_le multiplicity_le_emultiplicity
theorem FiniteMultiplicity.lt_multiplicity_of_lt_emultiplicity (hfin : FiniteMultiplicity a b)
{n : ℕ} (h : n < emultiplicity a b) : n < multiplicity a b := by
rw [emultiplicity_eq_multiplicity hfin] at h
assumption_mod_cast
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.lt_multiplicity_of_lt_emultiplicity :=
FiniteMultiplicity.lt_multiplicity_of_lt_emultiplicity
theorem emultiplicity_pos_iff :
0 < emultiplicity a b ↔ 0 < multiplicity a b := by
simp [pos_iff_ne_zero, pos_iff_ne_zero, emultiplicity_eq_zero_iff_multiplicity_eq_zero]
theorem FiniteMultiplicity.def : FiniteMultiplicity a b ↔ ∃ n : ℕ, ¬a ^ (n + 1) ∣ b :=
Iff.rfl
@[deprecated (since := "2024-11-30")] alias multiplicity.Finite.def := FiniteMultiplicity.def
theorem FiniteMultiplicity.not_dvd_of_one_right : FiniteMultiplicity a 1 → ¬a ∣ 1 :=
fun ⟨n, hn⟩ ⟨d, hd⟩ => hn ⟨d ^ (n + 1), (pow_mul_pow_eq_one (n + 1) hd.symm).symm⟩
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.not_dvd_of_one_right := FiniteMultiplicity.not_dvd_of_one_right
@[norm_cast]
theorem Int.natCast_emultiplicity (a b : ℕ) :
emultiplicity (a : ℤ) (b : ℤ) = emultiplicity a b := by
unfold emultiplicity FiniteMultiplicity
congr! <;> norm_cast
@[norm_cast]
theorem Int.natCast_multiplicity (a b : ℕ) : multiplicity (a : ℤ) (b : ℤ) = multiplicity a b :=
multiplicity_eq_of_emultiplicity_eq (natCast_emultiplicity a b)
theorem FiniteMultiplicity.not_iff_forall : ¬FiniteMultiplicity a b ↔ ∀ n : ℕ, a ^ n ∣ b :=
⟨fun h n =>
Nat.casesOn n
(by
rw [_root_.pow_zero]
exact one_dvd _)
(by simpa [FiniteMultiplicity] using h),
by simp [FiniteMultiplicity, multiplicity]; tauto⟩
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.not_iff_forall := FiniteMultiplicity.not_iff_forall
theorem FiniteMultiplicity.not_unit (h : FiniteMultiplicity a b) : ¬IsUnit a :=
let ⟨n, hn⟩ := h
hn ∘ IsUnit.dvd ∘ IsUnit.pow (n + 1)
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.not_unit := FiniteMultiplicity.not_unit
theorem FiniteMultiplicity.mul_left {c : α} :
FiniteMultiplicity a (b * c) → FiniteMultiplicity a b := fun ⟨n, hn⟩ =>
⟨n, fun h => hn (h.trans (dvd_mul_right _ _))⟩
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.mul_left := FiniteMultiplicity.mul_left
theorem pow_dvd_of_le_emultiplicity {k : ℕ} (hk : k ≤ emultiplicity a b) :
a ^ k ∣ b := by classical
cases k
· simp
unfold emultiplicity at hk
split at hk
· norm_cast at hk
simpa using (Nat.find_min _ (lt_of_succ_le hk))
· apply FiniteMultiplicity.not_iff_forall.mp ‹_›
theorem pow_dvd_of_le_multiplicity {k : ℕ} (hk : k ≤ multiplicity a b) :
a ^ k ∣ b := pow_dvd_of_le_emultiplicity (le_emultiplicity_of_le_multiplicity hk)
@[simp]
theorem pow_multiplicity_dvd (a b : α) : a ^ (multiplicity a b) ∣ b :=
pow_dvd_of_le_multiplicity le_rfl
theorem not_pow_dvd_of_emultiplicity_lt {m : ℕ} (hm : emultiplicity a b < m) :
¬a ^ m ∣ b := fun nh => by
unfold emultiplicity at hm
split at hm
· simp only [cast_lt, find_lt_iff] at hm
obtain ⟨n, hn1, hn2⟩ := hm
exact hn2 ((pow_dvd_pow _ hn1).trans nh)
· simp at hm
theorem FiniteMultiplicity.not_pow_dvd_of_multiplicity_lt (hf : FiniteMultiplicity a b) {m : ℕ}
(hm : multiplicity a b < m) : ¬a ^ m ∣ b := by
apply not_pow_dvd_of_emultiplicity_lt
rw [hf.emultiplicity_eq_multiplicity]
norm_cast
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.not_pow_dvd_of_multiplicity_lt :=
FiniteMultiplicity.not_pow_dvd_of_multiplicity_lt
theorem multiplicity_pos_of_dvd (hdiv : a ∣ b) : 0 < multiplicity a b := by
refine Nat.pos_iff_ne_zero.2 fun h => ?_
simpa [hdiv] using FiniteMultiplicity.not_pow_dvd_of_multiplicity_lt
(by by_contra! nh; simp [nh] at h) (lt_one_iff.mpr h)
theorem emultiplicity_pos_of_dvd (hdiv : a ∣ b) : 0 < emultiplicity a b :=
lt_emultiplicity_of_lt_multiplicity (multiplicity_pos_of_dvd hdiv)
theorem emultiplicity_eq_of_dvd_of_not_dvd {k : ℕ} (hk : a ^ k ∣ b) (hsucc : ¬a ^ (k + 1) ∣ b) :
emultiplicity a b = k := by classical
have : FiniteMultiplicity a b := ⟨k, hsucc⟩
simp only [emultiplicity, this, ↓reduceDIte, Nat.cast_inj, find_eq_iff, hsucc, not_false_eq_true,
Decidable.not_not, true_and]
exact fun n hn ↦ (pow_dvd_pow _ hn).trans hk
theorem multiplicity_eq_of_dvd_of_not_dvd {k : ℕ} (hk : a ^ k ∣ b) (hsucc : ¬a ^ (k + 1) ∣ b) :
multiplicity a b = k :=
multiplicity_eq_of_emultiplicity_eq_some (emultiplicity_eq_of_dvd_of_not_dvd hk hsucc)
theorem le_emultiplicity_of_pow_dvd {k : ℕ} (hk : a ^ k ∣ b) :
k ≤ emultiplicity a b :=
le_of_not_gt fun hk' => not_pow_dvd_of_emultiplicity_lt hk' hk
theorem FiniteMultiplicity.le_multiplicity_of_pow_dvd (hf : FiniteMultiplicity a b)
{k : ℕ} (hk : a ^ k ∣ b) : k ≤ multiplicity a b :=
hf.le_multiplicity_of_le_emultiplicity (le_emultiplicity_of_pow_dvd hk)
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.le_multiplicity_of_pow_dvd :=
FiniteMultiplicity.le_multiplicity_of_pow_dvd
theorem pow_dvd_iff_le_emultiplicity {k : ℕ} :
a ^ k ∣ b ↔ k ≤ emultiplicity a b :=
⟨le_emultiplicity_of_pow_dvd, pow_dvd_of_le_emultiplicity⟩
theorem FiniteMultiplicity.pow_dvd_iff_le_multiplicity (hf : FiniteMultiplicity a b) {k : ℕ} :
a ^ k ∣ b ↔ k ≤ multiplicity a b := by
exact_mod_cast hf.emultiplicity_eq_multiplicity ▸ pow_dvd_iff_le_emultiplicity
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.pow_dvd_iff_le_multiplicity :=
FiniteMultiplicity.pow_dvd_iff_le_multiplicity
theorem emultiplicity_lt_iff_not_dvd {k : ℕ} :
emultiplicity a b < k ↔ ¬a ^ k ∣ b := by rw [pow_dvd_iff_le_emultiplicity, not_le]
theorem FiniteMultiplicity.multiplicity_lt_iff_not_dvd {k : ℕ} (hf : FiniteMultiplicity a b) :
multiplicity a b < k ↔ ¬a ^ k ∣ b := by rw [hf.pow_dvd_iff_le_multiplicity, not_le]
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.multiplicity_lt_iff_not_dvd :=
FiniteMultiplicity.multiplicity_lt_iff_not_dvd
theorem emultiplicity_eq_coe {n : ℕ} :
emultiplicity a b = n ↔ a ^ n ∣ b ∧ ¬a ^ (n + 1) ∣ b := by
constructor
· intro h
constructor
· apply pow_dvd_of_le_emultiplicity
simp [h]
· apply not_pow_dvd_of_emultiplicity_lt
rw [h]
norm_cast
simp
· rw [and_imp]
apply emultiplicity_eq_of_dvd_of_not_dvd
theorem FiniteMultiplicity.multiplicity_eq_iff (hf : FiniteMultiplicity a b) {n : ℕ} :
multiplicity a b = n ↔ a ^ n ∣ b ∧ ¬a ^ (n + 1) ∣ b := by
simp [← emultiplicity_eq_coe, hf.emultiplicity_eq_multiplicity]
theorem emultiplicity_eq_ofNat {a b n : ℕ} [n.AtLeastTwo] :
emultiplicity a b = (ofNat(n) : ℕ∞) ↔ a ^ ofNat(n) ∣ b ∧ ¬a ^ (ofNat(n) + 1) ∣ b :=
emultiplicity_eq_coe
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.multiplicity_eq_iff := FiniteMultiplicity.multiplicity_eq_iff
@[simp]
theorem FiniteMultiplicity.not_of_isUnit_left (b : α) (ha : IsUnit a) : ¬FiniteMultiplicity a b :=
(·.not_unit ha)
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.not_of_isUnit_left := FiniteMultiplicity.not_of_isUnit_left
theorem FiniteMultiplicity.not_of_one_left (b : α) : ¬ FiniteMultiplicity 1 b := by simp
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.not_of_one_left := FiniteMultiplicity.not_of_one_left
@[simp]
theorem emultiplicity_one_left (b : α) : emultiplicity 1 b = ⊤ :=
emultiplicity_eq_top.2 (FiniteMultiplicity.not_of_one_left _)
@[simp]
theorem FiniteMultiplicity.one_right (ha : FiniteMultiplicity a 1) : multiplicity a 1 = 0 := by
simp [ha.multiplicity_eq_iff, ha.not_dvd_of_one_right]
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.one_right := FiniteMultiplicity.one_right
theorem FiniteMultiplicity.not_of_unit_left (a : α) (u : αˣ) : ¬ FiniteMultiplicity (u : α) a :=
FiniteMultiplicity.not_of_isUnit_left a u.isUnit
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.not_of_unit_left := FiniteMultiplicity.not_of_unit_left
theorem emultiplicity_eq_zero :
emultiplicity a b = 0 ↔ ¬a ∣ b := by
by_cases hf : FiniteMultiplicity a b
· rw [← ENat.coe_zero, emultiplicity_eq_coe]
simp
· simpa [emultiplicity_eq_top.2 hf] using FiniteMultiplicity.not_iff_forall.1 hf 1
theorem multiplicity_eq_zero :
multiplicity a b = 0 ↔ ¬a ∣ b :=
(emultiplicity_eq_iff_multiplicity_eq_of_ne_one zero_ne_one).symm.trans emultiplicity_eq_zero
theorem emultiplicity_ne_zero :
emultiplicity a b ≠ 0 ↔ a ∣ b := by
simp [emultiplicity_eq_zero]
theorem multiplicity_ne_zero :
multiplicity a b ≠ 0 ↔ a ∣ b := by
simp [multiplicity_eq_zero]
theorem FiniteMultiplicity.exists_eq_pow_mul_and_not_dvd (hfin : FiniteMultiplicity a b) :
∃ c : α, b = a ^ multiplicity a b * c ∧ ¬a ∣ c := by
obtain ⟨c, hc⟩ := pow_multiplicity_dvd a b
refine ⟨c, hc, ?_⟩
rintro ⟨k, hk⟩
rw [hk, ← mul_assoc, ← _root_.pow_succ] at hc
have h₁ : a ^ (multiplicity a b + 1) ∣ b := ⟨k, hc⟩
exact (hfin.multiplicity_eq_iff.1 (by simp)).2 h₁
@[deprecated (since := "2024-11-30")]
alias multiplicity.Finite.exists_eq_pow_mul_and_not_dvd :=
FiniteMultiplicity.exists_eq_pow_mul_and_not_dvd
theorem emultiplicity_le_emultiplicity_iff {c d : β} :
emultiplicity a b ≤ emultiplicity c d ↔ ∀ n : ℕ, a ^ n ∣ b → c ^ n ∣ d := by classical
constructor
· exact fun h n hab ↦ pow_dvd_of_le_emultiplicity (le_trans (le_emultiplicity_of_pow_dvd hab) h)
· intro h
unfold emultiplicity
-- aesop? says
split
next h_1 =>
obtain ⟨w, h_1⟩ := h_1
split
| next h_2 =>
simp_all only [cast_le, le_find_iff, lt_find_iff, Decidable.not_not, le_refl,
not_true_eq_false, not_false_eq_true, implies_true]
next h_2 => simp_all only [not_exists, Decidable.not_not, le_top]
| Mathlib/RingTheory/Multiplicity.lean | 435 | 438 |
/-
Copyright (c) 2019 Zhouhang Zhou. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Zhouhang Zhou, Yury Kudryashov, Sébastien Gouëzel, Rémy Degenne
-/
import Mathlib.MeasureTheory.Integral.Bochner.Basic
import Mathlib.MeasureTheory.Integral.Bochner.L1
import Mathlib.MeasureTheory.Integral.Bochner.VitaliCaratheodory
deprecated_module (since := "2025-04-13")
| Mathlib/MeasureTheory/Integral/Bochner.lean | 317 | 319 | |
/-
Copyright (c) 2020 Yury Kudryashov. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Yury Kudryashov
-/
import Mathlib.Algebra.Group.Pi.Basic
import Mathlib.Data.Set.BooleanAlgebra
import Mathlib.Data.Set.Piecewise
import Mathlib.Order.Interval.Set.Basic
import Mathlib.Order.Interval.Set.UnorderedInterval
/-!
# Intervals in `pi`-space
In this we prove various simple lemmas about intervals in `Π i, α i`. Closed intervals (`Ici x`,
`Iic x`, `Icc x y`) are equal to products of their projections to `α i`, while (semi-)open intervals
usually include the corresponding products as proper subsets.
-/
-- Porting note: Added, since dot notation no longer works on `Function.update`
open Function
variable {ι : Type*} {α : ι → Type*}
namespace Set
section PiPreorder
variable [∀ i, Preorder (α i)] (x y : ∀ i, α i)
@[simp]
theorem pi_univ_Ici : (pi univ fun i ↦ Ici (x i)) = Ici x :=
ext fun y ↦ by simp [Pi.le_def]
@[simp]
theorem pi_univ_Iic : (pi univ fun i ↦ Iic (x i)) = Iic x :=
ext fun y ↦ by simp [Pi.le_def]
@[simp]
theorem pi_univ_Icc : (pi univ fun i ↦ Icc (x i) (y i)) = Icc x y :=
ext fun y ↦ by simp [Pi.le_def, forall_and]
theorem piecewise_mem_Icc {s : Set ι} [∀ j, Decidable (j ∈ s)] {f₁ f₂ g₁ g₂ : ∀ i, α i}
(h₁ : ∀ i ∈ s, f₁ i ∈ Icc (g₁ i) (g₂ i)) (h₂ : ∀ i ∉ s, f₂ i ∈ Icc (g₁ i) (g₂ i)) :
s.piecewise f₁ f₂ ∈ Icc g₁ g₂ :=
⟨le_piecewise (fun i hi ↦ (h₁ i hi).1) fun i hi ↦ (h₂ i hi).1,
piecewise_le (fun i hi ↦ (h₁ i hi).2) fun i hi ↦ (h₂ i hi).2⟩
theorem piecewise_mem_Icc' {s : Set ι} [∀ j, Decidable (j ∈ s)] {f₁ f₂ g₁ g₂ : ∀ i, α i}
(h₁ : f₁ ∈ Icc g₁ g₂) (h₂ : f₂ ∈ Icc g₁ g₂) : s.piecewise f₁ f₂ ∈ Icc g₁ g₂ :=
piecewise_mem_Icc (fun _ _ ↦ ⟨h₁.1 _, h₁.2 _⟩) fun _ _ ↦ ⟨h₂.1 _, h₂.2 _⟩
section Nonempty
theorem pi_univ_Ioi_subset [Nonempty ι]: (pi univ fun i ↦ Ioi (x i)) ⊆ Ioi x := fun _ hz ↦
⟨fun i ↦ le_of_lt <| hz i trivial, fun h ↦
(‹Nonempty ι›.elim) fun i ↦ not_lt_of_le (h i) (hz i trivial)⟩
theorem pi_univ_Iio_subset [Nonempty ι]: (pi univ fun i ↦ Iio (x i)) ⊆ Iio x :=
pi_univ_Ioi_subset (α := fun i ↦ (α i)ᵒᵈ) x
theorem pi_univ_Ioo_subset [Nonempty ι]: (pi univ fun i ↦ Ioo (x i) (y i)) ⊆ Ioo x y := fun _ hx ↦
⟨(pi_univ_Ioi_subset _) fun i hi ↦ (hx i hi).1, (pi_univ_Iio_subset _) fun i hi ↦ (hx i hi).2⟩
theorem pi_univ_Ioc_subset [Nonempty ι]: (pi univ fun i ↦ Ioc (x i) (y i)) ⊆ Ioc x y := fun _ hx ↦
⟨(pi_univ_Ioi_subset _) fun i hi ↦ (hx i hi).1, fun i ↦ (hx i trivial).2⟩
theorem pi_univ_Ico_subset [Nonempty ι]: (pi univ fun i ↦ Ico (x i) (y i)) ⊆ Ico x y := fun _ hx ↦
⟨fun i ↦ (hx i trivial).1, (pi_univ_Iio_subset _) fun i hi ↦ (hx i hi).2⟩
end Nonempty
variable [DecidableEq ι]
open Function (update)
theorem pi_univ_Ioc_update_left {x y : ∀ i, α i} {i₀ : ι} {m : α i₀} (hm : x i₀ ≤ m) :
(pi univ fun i ↦ Ioc (update x i₀ m i) (y i)) =
{ z | m < z i₀ } ∩ pi univ fun i ↦ Ioc (x i) (y i) := by
have : Ioc m (y i₀) = Ioi m ∩ Ioc (x i₀) (y i₀) := by
rw [← Ioi_inter_Iic, ← Ioi_inter_Iic, ← inter_assoc,
inter_eq_self_of_subset_left (Ioi_subset_Ioi hm)]
simp_rw [univ_pi_update i₀ _ _ fun i z ↦ Ioc z (y i), ← pi_inter_compl ({i₀} : Set ι),
singleton_pi', ← inter_assoc, this]
rfl
theorem pi_univ_Ioc_update_right {x y : ∀ i, α i} {i₀ : ι} {m : α i₀} (hm : m ≤ y i₀) :
(pi univ fun i ↦ Ioc (x i) (update y i₀ m i)) =
{ z | z i₀ ≤ m } ∩ pi univ fun i ↦ Ioc (x i) (y i) := by
have : Ioc (x i₀) m = Iic m ∩ Ioc (x i₀) (y i₀) := by
rw [← Ioi_inter_Iic, ← Ioi_inter_Iic, inter_left_comm,
inter_eq_self_of_subset_left (Iic_subset_Iic.2 hm)]
simp_rw [univ_pi_update i₀ y m fun i z ↦ Ioc (x i) z, ← pi_inter_compl ({i₀} : Set ι),
singleton_pi', ← inter_assoc, this]
rfl
theorem disjoint_pi_univ_Ioc_update_left_right {x y : ∀ i, α i} {i₀ : ι} {m : α i₀} :
Disjoint (pi univ fun i ↦ Ioc (x i) (update y i₀ m i))
(pi univ fun i ↦ Ioc (update x i₀ m i) (y i)) := by
rw [disjoint_left]
rintro z h₁ h₂
refine (h₁ i₀ (mem_univ _)).2.not_lt ?_
simpa only [Function.update_self] using (h₂ i₀ (mem_univ _)).1
end PiPreorder
section PiPartialOrder
variable [DecidableEq ι] [∀ i, PartialOrder (α i)]
-- Porting note: Dot notation on `Function.update` broke
theorem image_update_Icc (f : ∀ i, α i) (i : ι) (a b : α i) :
update f i '' Icc a b = Icc (update f i a) (update f i b) := by
ext x
rw [← Set.pi_univ_Icc]
refine ⟨?_, fun h => ⟨x i, ?_, ?_⟩⟩
· rintro ⟨c, hc, rfl⟩
simpa [update_le_update_iff]
· simpa only [Function.update_self] using h i (mem_univ i)
· ext j
obtain rfl | hij := eq_or_ne i j
· exact Function.update_self ..
· simpa only [Function.update_of_ne hij.symm, le_antisymm_iff] using h j (mem_univ j)
theorem image_update_Ico (f : ∀ i, α i) (i : ι) (a b : α i) :
update f i '' Ico a b = Ico (update f i a) (update f i b) := by
rw [← Icc_diff_right, ← Icc_diff_right, image_diff (update_injective _ _), image_singleton,
image_update_Icc]
theorem image_update_Ioc (f : ∀ i, α i) (i : ι) (a b : α i) :
update f i '' Ioc a b = Ioc (update f i a) (update f i b) := by
rw [← Icc_diff_left, ← Icc_diff_left, image_diff (update_injective _ _), image_singleton,
image_update_Icc]
theorem image_update_Ioo (f : ∀ i, α i) (i : ι) (a b : α i) :
update f i '' Ioo a b = Ioo (update f i a) (update f i b) := by
rw [← Ico_diff_left, ← Ico_diff_left, image_diff (update_injective _ _), image_singleton,
image_update_Ico]
theorem image_update_Icc_left (f : ∀ i, α i) (i : ι) (a : α i) :
update f i '' Icc a (f i) = Icc (update f i a) f := by simpa using image_update_Icc f i a (f i)
theorem image_update_Ico_left (f : ∀ i, α i) (i : ι) (a : α i) :
update f i '' Ico a (f i) = Ico (update f i a) f := by simpa using image_update_Ico f i a (f i)
theorem image_update_Ioc_left (f : ∀ i, α i) (i : ι) (a : α i) :
update f i '' Ioc a (f i) = Ioc (update f i a) f := by simpa using image_update_Ioc f i a (f i)
theorem image_update_Ioo_left (f : ∀ i, α i) (i : ι) (a : α i) :
update f i '' Ioo a (f i) = Ioo (update f i a) f := by simpa using image_update_Ioo f i a (f i)
theorem image_update_Icc_right (f : ∀ i, α i) (i : ι) (b : α i) :
update f i '' Icc (f i) b = Icc f (update f i b) := by simpa using image_update_Icc f i (f i) b
theorem image_update_Ico_right (f : ∀ i, α i) (i : ι) (b : α i) :
update f i '' Ico (f i) b = Ico f (update f i b) := by simpa using image_update_Ico f i (f i) b
theorem image_update_Ioc_right (f : ∀ i, α i) (i : ι) (b : α i) :
update f i '' Ioc (f i) b = Ioc f (update f i b) := by simpa using image_update_Ioc f i (f i) b
theorem image_update_Ioo_right (f : ∀ i, α i) (i : ι) (b : α i) :
update f i '' Ioo (f i) b = Ioo f (update f i b) := by simpa using image_update_Ioo f i (f i) b
variable [∀ i, One (α i)]
@[to_additive]
theorem image_mulSingle_Icc (i : ι) (a b : α i) :
Pi.mulSingle i '' Icc a b = Icc (Pi.mulSingle i a) (Pi.mulSingle i b) :=
image_update_Icc _ _ _ _
@[to_additive]
| theorem image_mulSingle_Ico (i : ι) (a b : α i) :
Pi.mulSingle i '' Ico a b = Ico (Pi.mulSingle i a) (Pi.mulSingle i b) :=
| Mathlib/Order/Interval/Set/Pi.lean | 172 | 173 |
/-
Copyright (c) 2020 Anne Baanen. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Anne Baanen, Kexing Ying, Eric Wieser
-/
import Mathlib.Data.Finset.Sym
import Mathlib.LinearAlgebra.BilinearMap
import Mathlib.LinearAlgebra.FiniteDimensional.Lemmas
import Mathlib.LinearAlgebra.Matrix.Determinant.Basic
import Mathlib.LinearAlgebra.Matrix.SesquilinearForm
import Mathlib.LinearAlgebra.Matrix.Symmetric
/-!
# Quadratic maps
This file defines quadratic maps on an `R`-module `M`, taking values in an `R`-module `N`.
An `N`-valued quadratic map on a module `M` over a commutative ring `R` is a map `Q : M → N` such
that:
* `QuadraticMap.map_smul`: `Q (a • x) = (a * a) • Q x`
* `QuadraticMap.polar_add_left`, `QuadraticMap.polar_add_right`,
`QuadraticMap.polar_smul_left`, `QuadraticMap.polar_smul_right`:
the map `QuadraticMap.polar Q := fun x y ↦ Q (x + y) - Q x - Q y` is bilinear.
This notion generalizes to commutative semirings using the approach in [izhakian2016][] which
requires that there be a (possibly non-unique) companion bilinear map `B` such that
`∀ x y, Q (x + y) = Q x + Q y + B x y`. Over a ring, this `B` is precisely `QuadraticMap.polar Q`.
To build a `QuadraticMap` from the `polar` axioms, use `QuadraticMap.ofPolar`.
Quadratic maps come with a scalar multiplication, `(a • Q) x = a • Q x`,
and composition with linear maps `f`, `Q.comp f x = Q (f x)`.
## Main definitions
* `QuadraticMap.ofPolar`: a more familiar constructor that works on rings
* `QuadraticMap.associated`: associated bilinear map
* `QuadraticMap.PosDef`: positive definite quadratic maps
* `QuadraticMap.Anisotropic`: anisotropic quadratic maps
* `QuadraticMap.discr`: discriminant of a quadratic map
* `QuadraticMap.IsOrtho`: orthogonality of vectors with respect to a quadratic map.
## Main statements
* `QuadraticMap.associated_left_inverse`,
* `QuadraticMap.associated_rightInverse`: in a commutative ring where 2 has
an inverse, there is a correspondence between quadratic maps and symmetric
bilinear forms
* `LinearMap.BilinForm.exists_orthogonal_basis`: There exists an orthogonal basis with
respect to any nondegenerate, symmetric bilinear map `B`.
## Notation
In this file, the variable `R` is used when a `CommSemiring` structure is available.
The variable `S` is used when `R` itself has a `•` action.
## Implementation notes
While the definition and many results make sense if we drop commutativity assumptions,
the correct definition of a quadratic maps in the noncommutative setting would require
substantial refactors from the current version, such that $Q(rm) = rQ(m)r^*$ for some
suitable conjugation $r^*$.
The [Zulip thread](https://leanprover.zulipchat.com/#narrow/stream/116395-maths/topic/Quadratic.20Maps/near/395529867)
has some further discussion.
## References
* https://en.wikipedia.org/wiki/Quadratic_form
* https://en.wikipedia.org/wiki/Discriminant#Quadratic_forms
## Tags
quadratic map, homogeneous polynomial, quadratic polynomial
-/
universe u v w
variable {S T : Type*}
variable {R : Type*} {M N P A : Type*}
open LinearMap (BilinMap BilinForm)
section Polar
variable [CommRing R] [AddCommGroup M] [AddCommGroup N]
namespace QuadraticMap
/-- Up to a factor 2, `Q.polar` is the associated bilinear map for a quadratic map `Q`.
Source of this name: https://en.wikipedia.org/wiki/Quadratic_form#Generalization
-/
def polar (f : M → N) (x y : M) :=
f (x + y) - f x - f y
protected theorem map_add (f : M → N) (x y : M) :
f (x + y) = f x + f y + polar f x y := by
rw [polar]
abel
theorem polar_add (f g : M → N) (x y : M) : polar (f + g) x y = polar f x y + polar g x y := by
simp only [polar, Pi.add_apply]
abel
theorem polar_neg (f : M → N) (x y : M) : polar (-f) x y = -polar f x y := by
simp only [polar, Pi.neg_apply, sub_eq_add_neg, neg_add]
theorem polar_smul [Monoid S] [DistribMulAction S N] (f : M → N) (s : S) (x y : M) :
polar (s • f) x y = s • polar f x y := by simp only [polar, Pi.smul_apply, smul_sub]
theorem polar_comm (f : M → N) (x y : M) : polar f x y = polar f y x := by
rw [polar, polar, add_comm, sub_sub, sub_sub, add_comm (f x) (f y)]
/-- Auxiliary lemma to express bilinearity of `QuadraticMap.polar` without subtraction. -/
theorem polar_add_left_iff {f : M → N} {x x' y : M} :
polar f (x + x') y = polar f x y + polar f x' y ↔
f (x + x' + y) + (f x + f x' + f y) = f (x + x') + f (x' + y) + f (y + x) := by
simp only [← add_assoc]
simp only [polar, sub_eq_iff_eq_add, eq_sub_iff_add_eq, sub_add_eq_add_sub, add_sub]
simp only [add_right_comm _ (f y) _, add_right_comm _ (f x') (f x)]
rw [add_comm y x, add_right_comm _ _ (f (x + y)), add_comm _ (f (x + y)),
add_right_comm (f (x + y)), add_left_inj]
theorem polar_comp {F : Type*} [AddCommGroup S] [FunLike F N S] [AddMonoidHomClass F N S]
(f : M → N) (g : F) (x y : M) :
polar (g ∘ f) x y = g (polar f x y) := by
simp only [polar, Pi.smul_apply, Function.comp_apply, map_sub]
/-- `QuadraticMap.polar` as a function from `Sym2`. -/
def polarSym2 (f : M → N) : Sym2 M → N :=
Sym2.lift ⟨polar f, polar_comm _⟩
@[simp]
lemma polarSym2_sym2Mk (f : M → N) (xy : M × M) : polarSym2 f (.mk xy) = polar f xy.1 xy.2 := rfl
end QuadraticMap
end Polar
/-- A quadratic map on a module.
For a more familiar constructor when `R` is a ring, see `QuadraticMap.ofPolar`. -/
structure QuadraticMap (R : Type u) (M : Type v) (N : Type w) [CommSemiring R] [AddCommMonoid M]
[Module R M] [AddCommMonoid N] [Module R N] where
toFun : M → N
toFun_smul : ∀ (a : R) (x : M), toFun (a • x) = (a * a) • toFun x
exists_companion' : ∃ B : BilinMap R M N, ∀ x y, toFun (x + y) = toFun x + toFun y + B x y
section QuadraticForm
variable (R : Type u) (M : Type v) [CommSemiring R] [AddCommMonoid M] [Module R M]
/-- A quadratic form on a module. -/
abbrev QuadraticForm : Type _ := QuadraticMap R M R
end QuadraticForm
namespace QuadraticMap
section DFunLike
variable [CommSemiring R] [AddCommMonoid M] [Module R M] [AddCommMonoid N] [Module R N]
variable {Q Q' : QuadraticMap R M N}
instance instFunLike : FunLike (QuadraticMap R M N) M N where
coe := toFun
coe_injective' x y h := by cases x; cases y; congr
variable (Q)
/-- The `simp` normal form for a quadratic map is `DFunLike.coe`, not `toFun`. -/
@[simp]
theorem toFun_eq_coe : Q.toFun = ⇑Q :=
rfl
-- this must come after the coe_to_fun definition
initialize_simps_projections QuadraticMap (toFun → apply)
variable {Q}
@[ext]
theorem ext (H : ∀ x : M, Q x = Q' x) : Q = Q' :=
DFunLike.ext _ _ H
theorem congr_fun (h : Q = Q') (x : M) : Q x = Q' x :=
DFunLike.congr_fun h _
/-- Copy of a `QuadraticMap` with a new `toFun` equal to the old one. Useful to fix definitional
equalities. -/
protected def copy (Q : QuadraticMap R M N) (Q' : M → N) (h : Q' = ⇑Q) : QuadraticMap R M N where
toFun := Q'
toFun_smul := h.symm ▸ Q.toFun_smul
exists_companion' := h.symm ▸ Q.exists_companion'
@[simp]
theorem coe_copy (Q : QuadraticMap R M N) (Q' : M → N) (h : Q' = ⇑Q) : ⇑(Q.copy Q' h) = Q' :=
rfl
theorem copy_eq (Q : QuadraticMap R M N) (Q' : M → N) (h : Q' = ⇑Q) : Q.copy Q' h = Q :=
DFunLike.ext' h
end DFunLike
section CommSemiring
variable [CommSemiring R] [AddCommMonoid M] [Module R M] [AddCommMonoid N] [Module R N]
variable (Q : QuadraticMap R M N)
protected theorem map_smul (a : R) (x : M) : Q (a • x) = (a * a) • Q x :=
Q.toFun_smul a x
theorem exists_companion : ∃ B : BilinMap R M N, ∀ x y, Q (x + y) = Q x + Q y + B x y :=
Q.exists_companion'
theorem map_add_add_add_map (x y z : M) :
Q (x + y + z) + (Q x + Q y + Q z) = Q (x + y) + Q (y + z) + Q (z + x) := by
obtain ⟨B, h⟩ := Q.exists_companion
rw [add_comm z x]
simp only [h, LinearMap.map_add₂]
abel
theorem map_add_self (x : M) : Q (x + x) = 4 • Q x := by
rw [← two_smul R x, Q.map_smul, ← Nat.cast_smul_eq_nsmul R]
norm_num
-- not @[simp] because it is superseded by `ZeroHomClass.map_zero`
protected theorem map_zero : Q 0 = 0 := by
rw [← @zero_smul R _ _ _ _ (0 : M), Q.map_smul, zero_mul, zero_smul]
instance zeroHomClass : ZeroHomClass (QuadraticMap R M N) M N :=
{ QuadraticMap.instFunLike (R := R) (M := M) (N := N) with map_zero := QuadraticMap.map_zero }
theorem map_smul_of_tower [CommSemiring S] [Algebra S R] [SMul S M] [IsScalarTower S R M]
[Module S N] [IsScalarTower S R N] (a : S)
(x : M) : Q (a • x) = (a * a) • Q x := by
rw [← IsScalarTower.algebraMap_smul R a x, Q.map_smul, ← RingHom.map_mul, algebraMap_smul]
end CommSemiring
section CommRing
variable [CommRing R] [AddCommGroup M] [AddCommGroup N]
variable [Module R M] [Module R N] (Q : QuadraticMap R M N)
@[simp]
protected theorem map_neg (x : M) : Q (-x) = Q x := by
rw [← @neg_one_smul R _ _ _ _ x, Q.map_smul, neg_one_mul, neg_neg, one_smul]
protected theorem map_sub (x y : M) : Q (x - y) = Q (y - x) := by rw [← neg_sub, Q.map_neg]
@[simp]
theorem polar_zero_left (y : M) : polar Q 0 y = 0 := by
simp only [polar, zero_add, QuadraticMap.map_zero, sub_zero, sub_self]
@[simp]
theorem polar_add_left (x x' y : M) : polar Q (x + x') y = polar Q x y + polar Q x' y :=
polar_add_left_iff.mpr <| Q.map_add_add_add_map x x' y
| @[simp]
| Mathlib/LinearAlgebra/QuadraticForm/Basic.lean | 261 | 261 |
/-
Copyright (c) 2018 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes, Abhimanyu Pallavi Sudhir, Jean Lo, Calle Sönne, Benjamin Davidson
-/
import Mathlib.Analysis.SpecialFunctions.Trigonometric.Complex
import Mathlib.Analysis.SpecialFunctions.Trigonometric.Deriv
/-!
# Complex trigonometric functions
Basic facts and derivatives for the complex trigonometric functions.
-/
noncomputable section
namespace Complex
open Set Filter
open scoped Real
theorem hasStrictDerivAt_tan {x : ℂ} (h : cos x ≠ 0) : HasStrictDerivAt tan (1 / cos x ^ 2) x := by
convert (hasStrictDerivAt_sin x).div (hasStrictDerivAt_cos x) h using 1
rw_mod_cast [← sin_sq_add_cos_sq x]
ring
theorem hasDerivAt_tan {x : ℂ} (h : cos x ≠ 0) : HasDerivAt tan (1 / cos x ^ 2) x :=
(hasStrictDerivAt_tan h).hasDerivAt
open scoped Topology
theorem tendsto_norm_tan_of_cos_eq_zero {x : ℂ} (hx : cos x = 0) :
Tendsto (fun x => ‖tan x‖) (𝓝[≠] x) atTop := by
simp only [tan_eq_sin_div_cos, norm_div]
have A : sin x ≠ 0 := fun h => by simpa [*, sq] using sin_sq_add_cos_sq x
have B : Tendsto cos (𝓝[≠] x) (𝓝[≠] 0) :=
hx ▸ (hasDerivAt_cos x).tendsto_nhdsNE (neg_ne_zero.2 A)
exact continuous_sin.continuousWithinAt.norm.pos_mul_atTop (norm_pos_iff.2 A)
(tendsto_norm_nhdsNE_zero.comp B).inv_tendsto_nhdsGT_zero
theorem tendsto_norm_tan_atTop (k : ℤ) :
Tendsto (fun x => ‖tan x‖) (𝓝[≠] ((2 * k + 1) * π / 2 : ℂ)) atTop :=
tendsto_norm_tan_of_cos_eq_zero <| cos_eq_zero_iff.2 ⟨k, rfl⟩
@[deprecated (since := "2025-02-17")] alias tendsto_abs_tan_of_cos_eq_zero :=
tendsto_norm_tan_of_cos_eq_zero
@[deprecated (since := "2025-02-17")] alias tendsto_abs_tan_atTop := tendsto_norm_tan_atTop
@[simp]
theorem continuousAt_tan {x : ℂ} : ContinuousAt tan x ↔ cos x ≠ 0 := by
| refine ⟨fun hc h₀ => ?_, fun h => (hasDerivAt_tan h).continuousAt⟩
exact not_tendsto_nhds_of_tendsto_atTop (tendsto_norm_tan_of_cos_eq_zero h₀) _
(hc.norm.tendsto.mono_left inf_le_left)
| Mathlib/Analysis/SpecialFunctions/Trigonometric/ComplexDeriv.lean | 53 | 56 |
/-
Copyright (c) 2021 Yury Kudryashov. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Yury Kudryashov
-/
import Mathlib.Analysis.Convex.Between
import Mathlib.MeasureTheory.Constructions.BorelSpace.Basic
import Mathlib.MeasureTheory.Measure.Lebesgue.Basic
import Mathlib.Topology.MetricSpace.Holder
import Mathlib.Topology.MetricSpace.MetricSeparated
/-!
# Hausdorff measure and metric (outer) measures
In this file we define the `d`-dimensional Hausdorff measure on an (extended) metric space `X` and
the Hausdorff dimension of a set in an (extended) metric space. Let `μ d δ` be the maximal outer
measure such that `μ d δ s ≤ (EMetric.diam s) ^ d` for every set of diameter less than `δ`. Then
the Hausdorff measure `μH[d] s` of `s` is defined as `⨆ δ > 0, μ d δ s`. By Caratheodory theorem
`MeasureTheory.OuterMeasure.IsMetric.borel_le_caratheodory`, this is a Borel measure on `X`.
The value of `μH[d]`, `d > 0`, on a set `s` (measurable or not) is given by
```
μH[d] s = ⨆ (r : ℝ≥0∞) (hr : 0 < r), ⨅ (t : ℕ → Set X) (hts : s ⊆ ⋃ n, t n)
(ht : ∀ n, EMetric.diam (t n) ≤ r), ∑' n, EMetric.diam (t n) ^ d
```
For every set `s` for any `d < d'` we have either `μH[d] s = ∞` or `μH[d'] s = 0`, see
`MeasureTheory.Measure.hausdorffMeasure_zero_or_top`. In
`Mathlib.Topology.MetricSpace.HausdorffDimension` we use this fact to define the Hausdorff dimension
`dimH` of a set in an (extended) metric space.
We also define two generalizations of the Hausdorff measure. In one generalization (see
`MeasureTheory.Measure.mkMetric`) we take any function `m (diam s)` instead of `(diam s) ^ d`. In
an even more general definition (see `MeasureTheory.Measure.mkMetric'`) we use any function
of `m : Set X → ℝ≥0∞`. Some authors start with a partial function `m` defined only on some sets
`s : Set X` (e.g., only on balls or only on measurable sets). This is equivalent to our definition
applied to `MeasureTheory.extend m`.
We also define a predicate `MeasureTheory.OuterMeasure.IsMetric` which says that an outer measure
is additive on metric separated pairs of sets: `μ (s ∪ t) = μ s + μ t` provided that
`⨅ (x ∈ s) (y ∈ t), edist x y ≠ 0`. This is the property required for the Caratheodory theorem
`MeasureTheory.OuterMeasure.IsMetric.borel_le_caratheodory`, so we prove this theorem for any
metric outer measure, then prove that outer measures constructed using `mkMetric'` are metric outer
measures.
## Main definitions
* `MeasureTheory.OuterMeasure.IsMetric`: an outer measure `μ` is called *metric* if
`μ (s ∪ t) = μ s + μ t` for any two metric separated sets `s` and `t`. A metric outer measure in a
Borel extended metric space is guaranteed to satisfy the Caratheodory condition, see
`MeasureTheory.OuterMeasure.IsMetric.borel_le_caratheodory`.
* `MeasureTheory.OuterMeasure.mkMetric'` and its particular case
`MeasureTheory.OuterMeasure.mkMetric`: a construction of an outer measure that is guaranteed to
be metric. Both constructions are generalizations of the Hausdorff measure. The same measures
interpreted as Borel measures are called `MeasureTheory.Measure.mkMetric'` and
`MeasureTheory.Measure.mkMetric`.
* `MeasureTheory.Measure.hausdorffMeasure` a.k.a. `μH[d]`: the `d`-dimensional Hausdorff measure.
There are many definitions of the Hausdorff measure that differ from each other by a
multiplicative constant. We put
`μH[d] s = ⨆ r > 0, ⨅ (t : ℕ → Set X) (hts : s ⊆ ⋃ n, t n) (ht : ∀ n, EMetric.diam (t n) ≤ r),
∑' n, ⨆ (ht : ¬Set.Subsingleton (t n)), (EMetric.diam (t n)) ^ d`,
see `MeasureTheory.Measure.hausdorffMeasure_apply`. In the most interesting case `0 < d` one
can omit the `⨆ (ht : ¬Set.Subsingleton (t n))` part.
## Main statements
### Basic properties
* `MeasureTheory.OuterMeasure.IsMetric.borel_le_caratheodory`: if `μ` is a metric outer measure
on an extended metric space `X` (that is, it is additive on pairs of metric separated sets), then
every Borel set is Caratheodory measurable (hence, `μ` defines an actual
`MeasureTheory.Measure`). See also `MeasureTheory.Measure.mkMetric`.
* `MeasureTheory.Measure.hausdorffMeasure_mono`: `μH[d] s` is an antitone function
of `d`.
* `MeasureTheory.Measure.hausdorffMeasure_zero_or_top`: if `d₁ < d₂`, then for any `s`, either
`μH[d₂] s = 0` or `μH[d₁] s = ∞`. Together with the previous lemma, this means that `μH[d] s` is
equal to infinity on some ray `(-∞, D)` and is equal to zero on `(D, +∞)`, where `D` is a possibly
infinite number called the *Hausdorff dimension* of `s`; `μH[D] s` can be zero, infinity, or
anything in between.
* `MeasureTheory.Measure.noAtoms_hausdorff`: Hausdorff measure has no atoms.
### Hausdorff measure in `ℝⁿ`
* `MeasureTheory.hausdorffMeasure_pi_real`: for a nonempty `ι`, `μH[card ι]` on `ι → ℝ` equals
Lebesgue measure.
## Notations
We use the following notation localized in `MeasureTheory`.
- `μH[d]` : `MeasureTheory.Measure.hausdorffMeasure d`
## Implementation notes
There are a few similar constructions called the `d`-dimensional Hausdorff measure. E.g., some
sources only allow coverings by balls and use `r ^ d` instead of `(diam s) ^ d`. While these
construction lead to different Hausdorff measures, they lead to the same notion of the Hausdorff
dimension.
## References
* [Herbert Federer, Geometric Measure Theory, Chapter 2.10][Federer1996]
## Tags
Hausdorff measure, measure, metric measure
-/
open scoped NNReal ENNReal Topology
open EMetric Set Function Filter Encodable Module TopologicalSpace
noncomputable section
variable {ι X Y : Type*} [EMetricSpace X] [EMetricSpace Y]
namespace MeasureTheory
namespace OuterMeasure
/-!
### Metric outer measures
In this section we define metric outer measures and prove Caratheodory theorem: a metric outer
measure has the Caratheodory property.
-/
/-- We say that an outer measure `μ` in an (e)metric space is *metric* if `μ (s ∪ t) = μ s + μ t`
for any two metric separated sets `s`, `t`. -/
def IsMetric (μ : OuterMeasure X) : Prop :=
∀ s t : Set X, Metric.AreSeparated s t → μ (s ∪ t) = μ s + μ t
namespace IsMetric
variable {μ : OuterMeasure X}
/-- A metric outer measure is additive on a finite set of pairwise metric separated sets. -/
theorem finset_iUnion_of_pairwise_separated (hm : IsMetric μ) {I : Finset ι} {s : ι → Set X}
(hI : ∀ i ∈ I, ∀ j ∈ I, i ≠ j → Metric.AreSeparated (s i) (s j)) :
μ (⋃ i ∈ I, s i) = ∑ i ∈ I, μ (s i) := by
classical
induction I using Finset.induction_on with
| empty => simp
| insert i I hiI ihI =>
simp only [Finset.mem_insert] at hI
rw [Finset.set_biUnion_insert, hm, ihI, Finset.sum_insert hiI]
exacts [fun i hi j hj hij => hI i (Or.inr hi) j (Or.inr hj) hij,
Metric.AreSeparated.finset_iUnion_right fun j hj =>
hI i (Or.inl rfl) j (Or.inr hj) (ne_of_mem_of_not_mem hj hiI).symm]
/-- Caratheodory theorem. If `m` is a metric outer measure, then every Borel measurable set `t` is
Caratheodory measurable: for any (not necessarily measurable) set `s` we have
`μ (s ∩ t) + μ (s \ t) = μ s`. -/
theorem borel_le_caratheodory (hm : IsMetric μ) : borel X ≤ μ.caratheodory := by
rw [borel_eq_generateFrom_isClosed]
refine MeasurableSpace.generateFrom_le fun t ht => μ.isCaratheodory_iff_le.2 fun s => ?_
set S : ℕ → Set X := fun n => {x ∈ s | (↑n)⁻¹ ≤ infEdist x t}
have Ssep (n) : Metric.AreSeparated (S n) t :=
⟨n⁻¹, ENNReal.inv_ne_zero.2 (ENNReal.natCast_ne_top _),
fun x hx y hy ↦ hx.2.trans <| infEdist_le_edist_of_mem hy⟩
have Ssep' : ∀ n, Metric.AreSeparated (S n) (s ∩ t) := fun n =>
(Ssep n).mono Subset.rfl inter_subset_right
have S_sub : ∀ n, S n ⊆ s \ t := fun n =>
subset_inter inter_subset_left (Ssep n).subset_compl_right
have hSs : ∀ n, μ (s ∩ t) + μ (S n) ≤ μ s := fun n =>
calc
μ (s ∩ t) + μ (S n) = μ (s ∩ t ∪ S n) := Eq.symm <| hm _ _ <| (Ssep' n).symm
_ ≤ μ (s ∩ t ∪ s \ t) := μ.mono <| union_subset_union_right _ <| S_sub n
_ = μ s := by rw [inter_union_diff]
have iUnion_S : ⋃ n, S n = s \ t := by
refine Subset.antisymm (iUnion_subset S_sub) ?_
rintro x ⟨hxs, hxt⟩
rw [mem_iff_infEdist_zero_of_closed ht] at hxt
rcases ENNReal.exists_inv_nat_lt hxt with ⟨n, hn⟩
exact mem_iUnion.2 ⟨n, hxs, hn.le⟩
/- Now we have `∀ n, μ (s ∩ t) + μ (S n) ≤ μ s` and we need to prove
`μ (s ∩ t) + μ (⋃ n, S n) ≤ μ s`. We can't pass to the limit because
`μ` is only an outer measure. -/
by_cases htop : μ (s \ t) = ∞
· rw [htop, add_top, ← htop]
exact μ.mono diff_subset
suffices μ (⋃ n, S n) ≤ ⨆ n, μ (S n) by calc
μ (s ∩ t) + μ (s \ t) = μ (s ∩ t) + μ (⋃ n, S n) := by rw [iUnion_S]
_ ≤ μ (s ∩ t) + ⨆ n, μ (S n) := by gcongr
_ = ⨆ n, μ (s ∩ t) + μ (S n) := ENNReal.add_iSup ..
_ ≤ μ s := iSup_le hSs
/- It suffices to show that `∑' k, μ (S (k + 1) \ S k) ≠ ∞`. Indeed, if we have this,
then for all `N` we have `μ (⋃ n, S n) ≤ μ (S N) + ∑' k, m (S (N + k + 1) \ S (N + k))`
and the second term tends to zero, see `OuterMeasure.iUnion_nat_of_monotone_of_tsum_ne_top`
for details. -/
have : ∀ n, S n ⊆ S (n + 1) := fun n x hx =>
⟨hx.1, le_trans (ENNReal.inv_le_inv.2 <| Nat.cast_le.2 n.le_succ) hx.2⟩
refine (μ.iUnion_nat_of_monotone_of_tsum_ne_top this ?_).le; clear this
/- While the sets `S (k + 1) \ S k` are not pairwise metric separated, the sets in each
subsequence `S (2 * k + 1) \ S (2 * k)` and `S (2 * k + 2) \ S (2 * k)` are metric separated,
so `m` is additive on each of those sequences. -/
rw [← tsum_even_add_odd ENNReal.summable ENNReal.summable, ENNReal.add_ne_top]
suffices ∀ a, (∑' k : ℕ, μ (S (2 * k + 1 + a) \ S (2 * k + a))) ≠ ∞ from
⟨by simpa using this 0, by simpa using this 1⟩
refine fun r => ne_top_of_le_ne_top htop ?_
rw [← iUnion_S, ENNReal.tsum_eq_iSup_nat, iSup_le_iff]
intro n
rw [← hm.finset_iUnion_of_pairwise_separated]
· exact μ.mono (iUnion_subset fun i => iUnion_subset fun _ x hx => mem_iUnion.2 ⟨_, hx.1⟩)
suffices ∀ i j, i < j → Metric.AreSeparated (S (2 * i + 1 + r)) (s \ S (2 * j + r)) from
fun i _ j _ hij => hij.lt_or_lt.elim
(fun h => (this i j h).mono inter_subset_left fun x hx => by exact ⟨hx.1.1, hx.2⟩)
fun h => (this j i h).symm.mono (fun x hx => by exact ⟨hx.1.1, hx.2⟩) inter_subset_left
intro i j hj
have A : ((↑(2 * j + r))⁻¹ : ℝ≥0∞) < (↑(2 * i + 1 + r))⁻¹ := by
rw [ENNReal.inv_lt_inv, Nat.cast_lt]; omega
refine ⟨(↑(2 * i + 1 + r))⁻¹ - (↑(2 * j + r))⁻¹, by simpa [tsub_eq_zero_iff_le] using A,
fun x hx y hy => ?_⟩
have : infEdist y t < (↑(2 * j + r))⁻¹ := not_le.1 fun hle => hy.2 ⟨hy.1, hle⟩
rcases infEdist_lt_iff.mp this with ⟨z, hzt, hyz⟩
have hxz : (↑(2 * i + 1 + r))⁻¹ ≤ edist x z := le_infEdist.1 hx.2 _ hzt
apply ENNReal.le_of_add_le_add_right hyz.ne_top
refine le_trans ?_ (edist_triangle _ _ _)
refine (add_le_add le_rfl hyz.le).trans (Eq.trans_le ?_ hxz)
rw [tsub_add_cancel_of_le A.le]
theorem le_caratheodory [MeasurableSpace X] [BorelSpace X] (hm : IsMetric μ) :
‹MeasurableSpace X› ≤ μ.caratheodory := by
rw [BorelSpace.measurable_eq (α := X)]
exact hm.borel_le_caratheodory
end IsMetric
/-!
### Constructors of metric outer measures
In this section we provide constructors `MeasureTheory.OuterMeasure.mkMetric'` and
`MeasureTheory.OuterMeasure.mkMetric` and prove that these outer measures are metric outer
measures. We also prove basic lemmas about `map`/`comap` of these measures.
-/
/-- Auxiliary definition for `OuterMeasure.mkMetric'`: given a function on sets
`m : Set X → ℝ≥0∞`, returns the maximal outer measure `μ` such that `μ s ≤ m s`
for any set `s` of diameter at most `r`. -/
def mkMetric'.pre (m : Set X → ℝ≥0∞) (r : ℝ≥0∞) : OuterMeasure X :=
boundedBy <| extend fun s (_ : diam s ≤ r) => m s
/-- Given a function `m : Set X → ℝ≥0∞`, `mkMetric' m` is the supremum of `mkMetric'.pre m r`
over `r > 0`. Equivalently, it is the limit of `mkMetric'.pre m r` as `r` tends to zero from
the right. -/
def mkMetric' (m : Set X → ℝ≥0∞) : OuterMeasure X :=
⨆ r > 0, mkMetric'.pre m r
/-- Given a function `m : ℝ≥0∞ → ℝ≥0∞` and `r > 0`, let `μ r` be the maximal outer measure such that
`μ s ≤ m (EMetric.diam s)` whenever `EMetric.diam s < r`. Then `mkMetric m = ⨆ r > 0, μ r`. -/
def mkMetric (m : ℝ≥0∞ → ℝ≥0∞) : OuterMeasure X :=
mkMetric' fun s => m (diam s)
namespace mkMetric'
variable {m : Set X → ℝ≥0∞} {r : ℝ≥0∞} {μ : OuterMeasure X} {s : Set X}
theorem le_pre : μ ≤ pre m r ↔ ∀ s : Set X, diam s ≤ r → μ s ≤ m s := by
simp only [pre, le_boundedBy, extend, le_iInf_iff]
theorem pre_le (hs : diam s ≤ r) : pre m r s ≤ m s :=
(boundedBy_le _).trans <| iInf_le _ hs
theorem mono_pre (m : Set X → ℝ≥0∞) {r r' : ℝ≥0∞} (h : r ≤ r') : pre m r' ≤ pre m r :=
le_pre.2 fun _ hs => pre_le (hs.trans h)
theorem mono_pre_nat (m : Set X → ℝ≥0∞) : Monotone fun k : ℕ => pre m k⁻¹ :=
fun k l h => le_pre.2 fun _ hs => pre_le (hs.trans <| by simpa)
theorem tendsto_pre (m : Set X → ℝ≥0∞) (s : Set X) :
Tendsto (fun r => pre m r s) (𝓝[>] 0) (𝓝 <| mkMetric' m s) := by
rw [← map_coe_Ioi_atBot, tendsto_map'_iff]
simp only [mkMetric', OuterMeasure.iSup_apply, iSup_subtype']
exact tendsto_atBot_iSup fun r r' hr => mono_pre _ hr _
theorem tendsto_pre_nat (m : Set X → ℝ≥0∞) (s : Set X) :
Tendsto (fun n : ℕ => pre m n⁻¹ s) atTop (𝓝 <| mkMetric' m s) := by
refine (tendsto_pre m s).comp (tendsto_inf.2 ⟨ENNReal.tendsto_inv_nat_nhds_zero, ?_⟩)
| refine tendsto_principal.2 (Eventually.of_forall fun n => ?_)
simp
| Mathlib/MeasureTheory/Measure/Hausdorff.lean | 282 | 283 |
/-
Copyright (c) 2019 Johannes Hölzl. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johannes Hölzl, Patrick Massot, Casper Putz, Anne Baanen
-/
import Mathlib.LinearAlgebra.Basis.Submodule
import Mathlib.LinearAlgebra.Matrix.Reindex
import Mathlib.LinearAlgebra.Matrix.ToLin
/-!
# Bases and matrices
This file defines the map `Basis.toMatrix` that sends a family of vectors to
the matrix of their coordinates with respect to some basis.
## Main definitions
* `Basis.toMatrix e v` is the matrix whose `i, j`th entry is `e.repr (v j) i`
* `basis.toMatrixEquiv` is `Basis.toMatrix` bundled as a linear equiv
## Main results
* `LinearMap.toMatrix_id_eq_basis_toMatrix`: `LinearMap.toMatrix b c id`
is equal to `Basis.toMatrix b c`
* `Basis.toMatrix_mul_toMatrix`: multiplying `Basis.toMatrix` with another
`Basis.toMatrix` gives a `Basis.toMatrix`
## Tags
matrix, basis
-/
noncomputable section
open LinearMap Matrix Set Submodule
open Matrix
section BasisToMatrix
variable {ι ι' κ κ' : Type*}
variable {R M : Type*} [CommSemiring R] [AddCommMonoid M] [Module R M]
variable {R₂ M₂ : Type*} [CommRing R₂] [AddCommGroup M₂] [Module R₂ M₂]
open Function Matrix
/-- From a basis `e : ι → M` and a family of vectors `v : ι' → M`, make the matrix whose columns
are the vectors `v i` written in the basis `e`. -/
def Basis.toMatrix (e : Basis ι R M) (v : ι' → M) : Matrix ι ι' R := fun i j => e.repr (v j) i
variable (e : Basis ι R M) (v : ι' → M) (i : ι) (j : ι')
namespace Basis
theorem toMatrix_apply : e.toMatrix v i j = e.repr (v j) i :=
rfl
theorem toMatrix_transpose_apply : (e.toMatrix v)ᵀ j = e.repr (v j) :=
funext fun _ => rfl
theorem toMatrix_eq_toMatrix_constr [Fintype ι] [DecidableEq ι] (v : ι → M) :
e.toMatrix v = LinearMap.toMatrix e e (e.constr ℕ v) := by
ext
rw [Basis.toMatrix_apply, LinearMap.toMatrix_apply, Basis.constr_basis]
-- TODO (maybe) Adjust the definition of `Basis.toMatrix` to eliminate the transpose.
theorem coePiBasisFun.toMatrix_eq_transpose [Finite ι] :
((Pi.basisFun R ι).toMatrix : Matrix ι ι R → Matrix ι ι R) = Matrix.transpose := by
ext M i j
rfl
@[simp]
theorem toMatrix_self [DecidableEq ι] : e.toMatrix e = 1 := by
unfold Basis.toMatrix
ext i j
simp [Basis.equivFun, Matrix.one_apply, Finsupp.single_apply, eq_comm]
theorem toMatrix_update [DecidableEq ι'] (x : M) :
e.toMatrix (Function.update v j x) = Matrix.updateCol (e.toMatrix v) j (e.repr x) := by
ext i' k
rw [Basis.toMatrix, Matrix.updateCol_apply, e.toMatrix_apply]
split_ifs with h
· rw [h, update_self j x v]
· rw [update_of_ne h]
/-- The basis constructed by `unitsSMul` has vectors given by a diagonal matrix. -/
@[simp]
theorem toMatrix_unitsSMul [DecidableEq ι] (e : Basis ι R₂ M₂) (w : ι → R₂ˣ) :
e.toMatrix (e.unitsSMul w) = diagonal ((↑) ∘ w) := by
ext i j
by_cases h : i = j
· simp [h, toMatrix_apply, unitsSMul_apply, Units.smul_def]
· simp [h, toMatrix_apply, unitsSMul_apply, Units.smul_def, Ne.symm h]
/-- The basis constructed by `isUnitSMul` has vectors given by a diagonal matrix. -/
@[simp]
theorem toMatrix_isUnitSMul [DecidableEq ι] (e : Basis ι R₂ M₂) {w : ι → R₂}
(hw : ∀ i, IsUnit (w i)) : e.toMatrix (e.isUnitSMul hw) = diagonal w :=
e.toMatrix_unitsSMul _
theorem toMatrix_smul_left {G} [Group G] [DistribMulAction G M] [SMulCommClass G R M] (g : G) :
(g • e).toMatrix v = e.toMatrix (g⁻¹ • v) := rfl
@[simp]
theorem sum_toMatrix_smul_self [Fintype ι] : ∑ i : ι, e.toMatrix v i j • e i = v j := by
simp_rw [e.toMatrix_apply, e.sum_repr]
theorem toMatrix_smul {R₁ S : Type*} [CommSemiring R₁] [Semiring S] [Algebra R₁ S] [Fintype ι]
[DecidableEq ι] (x : S) (b : Basis ι R₁ S) (w : ι → S) :
(b.toMatrix (x • w)) = (Algebra.leftMulMatrix b x) * (b.toMatrix w) := by
ext
| rw [Basis.toMatrix_apply, Pi.smul_apply, smul_eq_mul, ← Algebra.leftMulMatrix_mulVec_repr]
rfl
| Mathlib/LinearAlgebra/Matrix/Basis.lean | 113 | 114 |
/-
Copyright (c) 2020 Zhouhang Zhou. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Zhouhang Zhou, Yury Kudryashov
-/
import Mathlib.MeasureTheory.Integral.Bochner.ContinuousLinearMap
import Mathlib.MeasureTheory.Integral.Bochner.FundThmCalculus
import Mathlib.MeasureTheory.Integral.Bochner.Set
deprecated_module (since := "2025-04-15")
| Mathlib/MeasureTheory/Integral/SetIntegral.lean | 1,440 | 1,443 | |
/-
Copyright (c) 2023 Adam Topaz. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Adam Topaz, Dagur Asgeirsson, Filippo A. E. Nuccio, Riccardo Brasca
-/
import Mathlib.Topology.Category.CompHausLike.Limits
import Mathlib.Topology.Category.Stonean.Basic
/-!
# Explicit limits and colimits
This file applies the general API for explicit limits and colimits in `CompHausLike P` (see
the file `Mathlib.Topology.Category.CompHausLike.Limits`) to the special case of `Stonean`.
-/
universe w u
open CategoryTheory Limits CompHausLike Topology
namespace Stonean
instance : HasExplicitFiniteCoproducts.{w, u} (fun Y ↦ ExtremallyDisconnected Y) where
hasProp _ := { hasProp := show ExtremallyDisconnected (Σ (_a : _), _) from inferInstance}
variable {X Y Z : Stonean} {f : X ⟶ Z} (i : Y ⟶ Z) (hi : IsOpenEmbedding f)
include hi
lemma extremallyDisconnected_preimage : ExtremallyDisconnected (i ⁻¹' (Set.range f)) where
open_closure U hU := by
have h : IsClopen (i ⁻¹' (Set.range f)) :=
⟨IsClosed.preimage i.hom.continuous (isCompact_range f.hom.continuous).isClosed,
IsOpen.preimage i.hom.continuous hi.isOpen_range⟩
rw [← (closure U).preimage_image_eq Subtype.coe_injective,
← h.1.isClosedEmbedding_subtypeVal.closure_image_eq U]
exact isOpen_induced (ExtremallyDisconnected.open_closure _
(h.2.isOpenEmbedding_subtypeVal.isOpenMap U hU))
lemma extremallyDisconnected_pullback : ExtremallyDisconnected {xy : X × Y | f xy.1 = i xy.2} :=
have := extremallyDisconnected_preimage i hi
let e := (TopCat.pullbackHomeoPreimage i i.hom.2 f hi.isEmbedding).symm
let e' : {xy : X × Y | f xy.1 = i xy.2} ≃ₜ {xy : Y × X | i xy.1 = f xy.2} := by
exact TopCat.homeoOfIso
((TopCat.pullbackIsoProdSubtype f i).symm ≪≫ pullbackSymmetry _ _ ≪≫
(TopCat.pullbackIsoProdSubtype i f))
extremallyDisconnected_of_homeo (e.trans e'.symm)
instance : HasExplicitPullbacksOfInclusions (fun (Y : TopCat.{u}) ↦ ExtremallyDisconnected Y) := by
apply CompHausLike.hasPullbacksOfInclusions
intro _ _ _ _ _ hi
exact ⟨extremallyDisconnected_pullback _ hi⟩
example : FinitaryExtensive Stonean.{u} := inferInstance
noncomputable example : PreservesFiniteCoproducts Stonean.toCompHaus := inferInstance
noncomputable example : PreservesFiniteCoproducts Stonean.toProfinite := inferInstance
end Stonean
| Mathlib/Topology/Category/Stonean/Limits.lean | 68 | 73 | |
/-
Copyright (c) 2020 Mario Carneiro. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Mario Carneiro, Floris van Doorn, Yury Kudryashov
-/
import Mathlib.Topology.Instances.NNReal.Lemmas
import Mathlib.Topology.Order.MonotoneContinuity
/-!
# Square root of a real number
In this file we define
* `NNReal.sqrt` to be the square root of a nonnegative real number.
* `Real.sqrt` to be the square root of a real number, defined to be zero on negative numbers.
Then we prove some basic properties of these functions.
## Implementation notes
We define `NNReal.sqrt` as the noncomputable inverse to the function `x ↦ x * x`. We use general
theory of inverses of strictly monotone functions to prove that `NNReal.sqrt x` exists. As a side
effect, `NNReal.sqrt` is a bundled `OrderIso`, so for `NNReal` numbers we get continuity as well as
theorems like `NNReal.sqrt x ≤ y ↔ x ≤ y * y` for free.
Then we define `Real.sqrt x` to be `NNReal.sqrt (Real.toNNReal x)`.
## Tags
square root
-/
open Set Filter
open scoped Filter NNReal Topology
namespace NNReal
variable {x y : ℝ≥0}
/-- Square root of a nonnegative real number. -/
-- Porting note (kmill): `pp_nodot` has no effect here
-- unless RFC https://github.com/leanprover/lean4/issues/6178 leads to dot notation pp for CoeFun
@[pp_nodot]
noncomputable def sqrt : ℝ≥0 ≃o ℝ≥0 :=
OrderIso.symm <| powOrderIso 2 two_ne_zero
@[simp] lemma sq_sqrt (x : ℝ≥0) : sqrt x ^ 2 = x := sqrt.symm_apply_apply _
@[simp] lemma sqrt_sq (x : ℝ≥0) : sqrt (x ^ 2) = x := sqrt.apply_symm_apply _
@[simp] lemma mul_self_sqrt (x : ℝ≥0) : sqrt x * sqrt x = x := by rw [← sq, sq_sqrt]
@[simp] lemma sqrt_mul_self (x : ℝ≥0) : sqrt (x * x) = x := by rw [← sq, sqrt_sq]
lemma sqrt_le_sqrt : sqrt x ≤ sqrt y ↔ x ≤ y := sqrt.le_iff_le
lemma sqrt_lt_sqrt : sqrt x < sqrt y ↔ x < y := sqrt.lt_iff_lt
lemma sqrt_eq_iff_eq_sq : sqrt x = y ↔ x = y ^ 2 := sqrt.toEquiv.apply_eq_iff_eq_symm_apply
lemma sqrt_le_iff_le_sq : sqrt x ≤ y ↔ x ≤ y ^ 2 := sqrt.to_galoisConnection _ _
lemma le_sqrt_iff_sq_le : x ≤ sqrt y ↔ x ^ 2 ≤ y := (sqrt.symm.to_galoisConnection _ _).symm
@[simp] lemma sqrt_eq_zero : sqrt x = 0 ↔ x = 0 := by simp [sqrt_eq_iff_eq_sq]
@[simp] lemma sqrt_eq_one : sqrt x = 1 ↔ x = 1 := by simp [sqrt_eq_iff_eq_sq]
@[simp] lemma sqrt_zero : sqrt 0 = 0 := by simp
@[simp] lemma sqrt_one : sqrt 1 = 1 := by simp
@[simp] lemma sqrt_le_one : sqrt x ≤ 1 ↔ x ≤ 1 := by rw [← sqrt_one, sqrt_le_sqrt, sqrt_one]
@[simp] lemma one_le_sqrt : 1 ≤ sqrt x ↔ 1 ≤ x := by rw [← sqrt_one, sqrt_le_sqrt, sqrt_one]
theorem sqrt_mul (x y : ℝ≥0) : sqrt (x * y) = sqrt x * sqrt y := by
rw [sqrt_eq_iff_eq_sq, mul_pow, sq_sqrt, sq_sqrt]
/-- `NNReal.sqrt` as a `MonoidWithZeroHom`. -/
noncomputable def sqrtHom : ℝ≥0 →*₀ ℝ≥0 :=
⟨⟨sqrt, sqrt_zero⟩, sqrt_one, sqrt_mul⟩
theorem sqrt_inv (x : ℝ≥0) : sqrt x⁻¹ = (sqrt x)⁻¹ :=
map_inv₀ sqrtHom x
theorem sqrt_div (x y : ℝ≥0) : sqrt (x / y) = sqrt x / sqrt y :=
map_div₀ sqrtHom x y
@[continuity, fun_prop]
theorem continuous_sqrt : Continuous sqrt := sqrt.continuous
@[simp] theorem sqrt_pos : 0 < sqrt x ↔ 0 < x := by simp [pos_iff_ne_zero]
alias ⟨_, sqrt_pos_of_pos⟩ := sqrt_pos
attribute [bound] sqrt_pos_of_pos
end NNReal
namespace Real
/-- The square root of a real number. This returns 0 for negative inputs.
This has notation `√x`. Note that `√x⁻¹` is parsed as `√(x⁻¹)`. -/
noncomputable def sqrt (x : ℝ) : ℝ :=
NNReal.sqrt (Real.toNNReal x)
-- TODO: replace this with a typeclass
@[inherit_doc]
prefix:max "√" => Real.sqrt
variable {x y : ℝ}
@[simp, norm_cast]
theorem coe_sqrt {x : ℝ≥0} : (NNReal.sqrt x : ℝ) = √(x : ℝ) := by
rw [Real.sqrt, Real.toNNReal_coe]
@[continuity]
theorem continuous_sqrt : Continuous (√· : ℝ → ℝ) :=
NNReal.continuous_coe.comp <| NNReal.continuous_sqrt.comp continuous_real_toNNReal
theorem sqrt_eq_zero_of_nonpos (h : x ≤ 0) : sqrt x = 0 := by simp [sqrt, Real.toNNReal_eq_zero.2 h]
@[simp] theorem sqrt_nonneg (x : ℝ) : 0 ≤ √x := NNReal.coe_nonneg _
@[simp]
theorem mul_self_sqrt (h : 0 ≤ x) : √x * √x = x := by
rw [Real.sqrt, ← NNReal.coe_mul, NNReal.mul_self_sqrt, Real.coe_toNNReal _ h]
@[simp]
theorem sqrt_mul_self (h : 0 ≤ x) : √(x * x) = x :=
(mul_self_inj_of_nonneg (sqrt_nonneg _) h).1 (mul_self_sqrt (mul_self_nonneg _))
theorem sqrt_eq_cases : √x = y ↔ y * y = x ∧ 0 ≤ y ∨ x < 0 ∧ y = 0 := by
constructor
· rintro rfl
rcases le_or_lt 0 x with hle | hlt
· exact Or.inl ⟨mul_self_sqrt hle, sqrt_nonneg x⟩
· exact Or.inr ⟨hlt, sqrt_eq_zero_of_nonpos hlt.le⟩
· rintro (⟨rfl, hy⟩ | ⟨hx, rfl⟩)
exacts [sqrt_mul_self hy, sqrt_eq_zero_of_nonpos hx.le]
theorem sqrt_eq_iff_mul_self_eq (hx : 0 ≤ x) (hy : 0 ≤ y) : √x = y ↔ x = y * y :=
⟨fun h => by rw [← h, mul_self_sqrt hx], fun h => by rw [h, sqrt_mul_self hy]⟩
theorem sqrt_eq_iff_mul_self_eq_of_pos (h : 0 < y) : √x = y ↔ y * y = x := by
simp [sqrt_eq_cases, h.ne', h.le]
@[simp]
theorem sqrt_eq_one : √x = 1 ↔ x = 1 :=
calc
√x = 1 ↔ 1 * 1 = x := sqrt_eq_iff_mul_self_eq_of_pos zero_lt_one
_ ↔ x = 1 := by rw [eq_comm, mul_one]
@[simp]
theorem sq_sqrt (h : 0 ≤ x) : √x ^ 2 = x := by rw [sq, mul_self_sqrt h]
@[simp]
theorem sqrt_sq (h : 0 ≤ x) : √(x ^ 2) = x := by rw [sq, sqrt_mul_self h]
theorem sqrt_eq_iff_eq_sq (hx : 0 ≤ x) (hy : 0 ≤ y) : √x = y ↔ x = y ^ 2 := by
rw [sq, sqrt_eq_iff_mul_self_eq hx hy]
theorem sqrt_mul_self_eq_abs (x : ℝ) : √(x * x) = |x| := by
rw [← abs_mul_abs_self x, sqrt_mul_self (abs_nonneg _)]
theorem sqrt_sq_eq_abs (x : ℝ) : √(x ^ 2) = |x| := by rw [sq, sqrt_mul_self_eq_abs]
@[simp]
theorem sqrt_zero : √0 = 0 := by simp [Real.sqrt]
@[simp]
theorem sqrt_one : √1 = 1 := by simp [Real.sqrt]
@[simp]
theorem sqrt_le_sqrt_iff (hy : 0 ≤ y) : √x ≤ √y ↔ x ≤ y := by
rw [Real.sqrt, Real.sqrt, NNReal.coe_le_coe, NNReal.sqrt_le_sqrt, toNNReal_le_toNNReal_iff hy]
@[simp]
theorem sqrt_lt_sqrt_iff (hx : 0 ≤ x) : √x < √y ↔ x < y :=
lt_iff_lt_of_le_iff_le (sqrt_le_sqrt_iff hx)
theorem sqrt_lt_sqrt_iff_of_pos (hy : 0 < y) : √x < √y ↔ x < y := by
rw [Real.sqrt, Real.sqrt, NNReal.coe_lt_coe, NNReal.sqrt_lt_sqrt, toNNReal_lt_toNNReal_iff hy]
@[gcongr, bound]
theorem sqrt_le_sqrt (h : x ≤ y) : √x ≤ √y := by
rw [Real.sqrt, Real.sqrt, NNReal.coe_le_coe, NNReal.sqrt_le_sqrt]
exact toNNReal_le_toNNReal h
@[gcongr, bound]
theorem sqrt_lt_sqrt (hx : 0 ≤ x) (h : x < y) : √x < √y :=
(sqrt_lt_sqrt_iff hx).2 h
theorem sqrt_le_left (hy : 0 ≤ y) : √x ≤ y ↔ x ≤ y ^ 2 := by
rw [sqrt, ← Real.le_toNNReal_iff_coe_le hy, NNReal.sqrt_le_iff_le_sq, sq, ← Real.toNNReal_mul hy,
Real.toNNReal_le_toNNReal_iff (mul_self_nonneg y), sq]
theorem sqrt_le_iff : √x ≤ y ↔ 0 ≤ y ∧ x ≤ y ^ 2 := by
rw [← and_iff_right_of_imp fun h => (sqrt_nonneg x).trans h, and_congr_right_iff]
exact sqrt_le_left
theorem sqrt_lt (hx : 0 ≤ x) (hy : 0 ≤ y) : √x < y ↔ x < y ^ 2 := by
rw [← sqrt_lt_sqrt_iff hx, sqrt_sq hy]
theorem sqrt_lt' (hy : 0 < y) : √x < y ↔ x < y ^ 2 := by
rw [← sqrt_lt_sqrt_iff_of_pos (pow_pos hy _), sqrt_sq hy.le]
/-- Note: if you want to conclude `x ≤ √y`, then use `Real.le_sqrt_of_sq_le`.
If you have `x > 0`, consider using `Real.le_sqrt'` -/
theorem le_sqrt (hx : 0 ≤ x) (hy : 0 ≤ y) : x ≤ √y ↔ x ^ 2 ≤ y :=
le_iff_le_iff_lt_iff_lt.2 <| sqrt_lt hy hx
theorem le_sqrt' (hx : 0 < x) : x ≤ √y ↔ x ^ 2 ≤ y :=
le_iff_le_iff_lt_iff_lt.2 <| sqrt_lt' hx
theorem abs_le_sqrt (h : x ^ 2 ≤ y) : |x| ≤ √y := by
rw [← sqrt_sq_eq_abs]; exact sqrt_le_sqrt h
theorem sq_le (h : 0 ≤ y) : x ^ 2 ≤ y ↔ -√y ≤ x ∧ x ≤ √y := by
constructor
· simpa only [abs_le] using abs_le_sqrt
· rw [← abs_le, ← sq_abs]
exact (le_sqrt (abs_nonneg x) h).mp
theorem neg_sqrt_le_of_sq_le (h : x ^ 2 ≤ y) : -√y ≤ x :=
((sq_le ((sq_nonneg x).trans h)).mp h).1
theorem le_sqrt_of_sq_le (h : x ^ 2 ≤ y) : x ≤ √y :=
((sq_le ((sq_nonneg x).trans h)).mp h).2
@[simp]
theorem sqrt_inj (hx : 0 ≤ x) (hy : 0 ≤ y) : √x = √y ↔ x = y := by
simp [le_antisymm_iff, hx, hy]
@[simp]
theorem sqrt_eq_zero (h : 0 ≤ x) : √x = 0 ↔ x = 0 := by simpa using sqrt_inj h le_rfl
theorem sqrt_eq_zero' : √x = 0 ↔ x ≤ 0 := by
rw [sqrt, NNReal.coe_eq_zero, NNReal.sqrt_eq_zero, Real.toNNReal_eq_zero]
theorem sqrt_ne_zero (h : 0 ≤ x) : √x ≠ 0 ↔ x ≠ 0 := by rw [not_iff_not, sqrt_eq_zero h]
theorem sqrt_ne_zero' : √x ≠ 0 ↔ 0 < x := by rw [← not_le, not_iff_not, sqrt_eq_zero']
@[simp]
theorem sqrt_pos : 0 < √x ↔ 0 < x :=
lt_iff_lt_of_le_iff_le (Iff.trans (by simp [le_antisymm_iff, sqrt_nonneg]) sqrt_eq_zero')
alias ⟨_, sqrt_pos_of_pos⟩ := sqrt_pos
lemma sqrt_le_sqrt_iff' (hx : 0 < x) : √x ≤ √y ↔ x ≤ y := by
obtain hy | hy := le_total y 0
· exact iff_of_false ((sqrt_eq_zero_of_nonpos hy).trans_lt <| sqrt_pos.2 hx).not_le
(hy.trans_lt hx).not_le
· exact sqrt_le_sqrt_iff hy
@[simp] lemma one_le_sqrt : 1 ≤ √x ↔ 1 ≤ x := by
rw [← sqrt_one, sqrt_le_sqrt_iff' zero_lt_one, sqrt_one]
@[simp] lemma sqrt_le_one : √x ≤ 1 ↔ x ≤ 1 := by
rw [← sqrt_one, sqrt_le_sqrt_iff zero_le_one, sqrt_one]
end Real
namespace Mathlib.Meta.Positivity
open Lean Meta Qq Function
/-- Extension for the `positivity` tactic: a square root of a strictly positive nonnegative real is
positive. -/
@[positivity NNReal.sqrt _]
def evalNNRealSqrt : PositivityExt where eval {u α} _zα _pα e := do
match u, α, e with
| 0, ~q(NNReal), ~q(NNReal.sqrt $a) =>
let ra ← core q(inferInstance) q(inferInstance) a
assertInstancesCommute
match ra with
| .positive pa => pure (.positive q(NNReal.sqrt_pos_of_pos $pa))
| _ => failure -- this case is dealt with by generic nonnegativity of nnreals
| _, _, _ => throwError "not NNReal.sqrt"
/-- Extension for the `positivity` tactic: a square root is nonnegative, and is strictly positive if
its input is. -/
@[positivity √_]
def evalSqrt : PositivityExt where eval {u α} _zα _pα e := do
match u, α, e with
| 0, ~q(ℝ), ~q(√$a) =>
let ra ← catchNone <| core q(inferInstance) q(inferInstance) a
assertInstancesCommute
match ra with
| .positive pa => pure (.positive q(Real.sqrt_pos_of_pos $pa))
| _ => pure (.nonnegative q(Real.sqrt_nonneg $a))
| _, _, _ => throwError "not Real.sqrt"
end Mathlib.Meta.Positivity
namespace Real
@[simp]
theorem sqrt_mul {x : ℝ} (hx : 0 ≤ x) (y : ℝ) : √(x * y) = √x * √y := by
simp_rw [Real.sqrt, ← NNReal.coe_mul, NNReal.coe_inj, Real.toNNReal_mul hx, NNReal.sqrt_mul]
@[simp]
theorem sqrt_mul' (x) {y : ℝ} (hy : 0 ≤ y) : √(x * y) = √x * √y := by
rw [mul_comm, sqrt_mul hy, mul_comm]
@[simp]
theorem sqrt_inv (x : ℝ) : √x⁻¹ = (√x)⁻¹ := by
rw [Real.sqrt, Real.toNNReal_inv, NNReal.sqrt_inv, NNReal.coe_inv, Real.sqrt]
@[simp]
theorem sqrt_div {x : ℝ} (hx : 0 ≤ x) (y : ℝ) : √(x / y) = √x / √y := by
rw [division_def, sqrt_mul hx, sqrt_inv, division_def]
@[simp]
theorem sqrt_div' (x) {y : ℝ} (hy : 0 ≤ y) : √(x / y) = √x / √y := by
rw [division_def, sqrt_mul' x (inv_nonneg.2 hy), sqrt_inv, division_def]
variable {x y : ℝ}
@[simp]
theorem div_sqrt : x / √x = √x := by
rcases le_or_lt x 0 with h | h
· rw [sqrt_eq_zero'.mpr h, div_zero]
· rw [div_eq_iff (sqrt_ne_zero'.mpr h), mul_self_sqrt h.le]
theorem sqrt_div_self' : √x / x = 1 / √x := by rw [← div_sqrt, one_div_div, div_sqrt]
theorem sqrt_div_self : √x / x = (√x)⁻¹ := by rw [sqrt_div_self', one_div]
theorem lt_sqrt (hx : 0 ≤ x) : x < √y ↔ x ^ 2 < y := by
rw [← sqrt_lt_sqrt_iff (sq_nonneg _), sqrt_sq hx]
theorem sq_lt : x ^ 2 < y ↔ -√y < x ∧ x < √y := by
rw [← abs_lt, ← sq_abs, lt_sqrt (abs_nonneg _)]
theorem neg_sqrt_lt_of_sq_lt (h : x ^ 2 < y) : -√y < x :=
(sq_lt.mp h).1
theorem lt_sqrt_of_sq_lt (h : x ^ 2 < y) : x < √y :=
(sq_lt.mp h).2
theorem lt_sq_of_sqrt_lt (h : √x < y) : x < y ^ 2 := by
have hy := x.sqrt_nonneg.trans_lt h
rwa [← sqrt_lt_sqrt_iff_of_pos (sq_pos_of_pos hy), sqrt_sq hy.le]
/-- The natural square root is at most the real square root -/
theorem nat_sqrt_le_real_sqrt {a : ℕ} : ↑(Nat.sqrt a) ≤ √(a : ℝ) := by
rw [Real.le_sqrt (Nat.cast_nonneg _) (Nat.cast_nonneg _)]
norm_cast
exact Nat.sqrt_le' a
/-- The real square root is less than the natural square root plus one -/
theorem real_sqrt_lt_nat_sqrt_succ {a : ℕ} : √(a : ℝ) < Nat.sqrt a + 1 := by
rw [sqrt_lt (by simp)] <;> norm_cast
· exact Nat.lt_succ_sqrt' a
· exact Nat.le_add_left 0 (Nat.sqrt a + 1)
/-- The real square root is at most the natural square root plus one -/
theorem real_sqrt_le_nat_sqrt_succ {a : ℕ} : √(a : ℝ) ≤ Nat.sqrt a + 1 :=
real_sqrt_lt_nat_sqrt_succ.le
/-- The floor of the real square root is the same as the natural square root. -/
@[simp]
theorem floor_real_sqrt_eq_nat_sqrt {a : ℕ} : ⌊√(a : ℝ)⌋ = Nat.sqrt a := by
rw [Int.floor_eq_iff]
exact ⟨nat_sqrt_le_real_sqrt, real_sqrt_lt_nat_sqrt_succ⟩
/-- The natural floor of the real square root is the same as the natural square root. -/
@[simp]
theorem nat_floor_real_sqrt_eq_nat_sqrt {a : ℕ} : ⌊√(a : ℝ)⌋₊ = Nat.sqrt a := by
rw [Nat.floor_eq_iff (sqrt_nonneg a)]
exact ⟨nat_sqrt_le_real_sqrt, real_sqrt_lt_nat_sqrt_succ⟩
/-- Bernoulli's inequality for exponent `1 / 2`, stated using `sqrt`. -/
theorem sqrt_one_add_le (h : -1 ≤ x) : √(1 + x) ≤ 1 + x / 2 := by
refine sqrt_le_iff.mpr ⟨by linarith, ?_⟩
calc 1 + x
_ ≤ 1 + x + (x / 2) ^ 2 := le_add_of_nonneg_right <| sq_nonneg _
_ = _ := by ring
end Real
open Real
|
variable {α : Type*}
| Mathlib/Data/Real/Sqrt.lean | 387 | 388 |
/-
Copyright (c) 2019 Yury Kudryashov. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Yury Kudryashov
-/
import Mathlib.Algebra.Order.BigOperators.Ring.Finset
import Mathlib.Analysis.Convex.Hull
import Mathlib.LinearAlgebra.AffineSpace.Basis
/-!
# Convex combinations
This file defines convex combinations of points in a vector space.
## Main declarations
* `Finset.centerMass`: Center of mass of a finite family of points.
## Implementation notes
We divide by the sum of the weights in the definition of `Finset.centerMass` because of the way
mathematical arguments go: one doesn't change weights, but merely adds some. This also makes a few
lemmas unconditional on the sum of the weights being `1`.
-/
open Set Function Pointwise
universe u u'
section
variable {R R' E F ι ι' α : Type*} [Field R] [Field R'] [AddCommGroup E] [AddCommGroup F]
[AddCommGroup α] [LinearOrder α] [Module R E] [Module R F] [Module R α] {s : Set E}
/-- Center of mass of a finite collection of points with prescribed weights.
Note that we require neither `0 ≤ w i` nor `∑ w = 1`. -/
def Finset.centerMass (t : Finset ι) (w : ι → R) (z : ι → E) : E :=
(∑ i ∈ t, w i)⁻¹ • ∑ i ∈ t, w i • z i
variable (i j : ι) (c : R) (t : Finset ι) (w : ι → R) (z : ι → E)
open Finset
theorem Finset.centerMass_empty : (∅ : Finset ι).centerMass w z = 0 := by
simp only [centerMass, sum_empty, smul_zero]
theorem Finset.centerMass_pair [DecidableEq ι] (hne : i ≠ j) :
({i, j} : Finset ι).centerMass w z = (w i / (w i + w j)) • z i + (w j / (w i + w j)) • z j := by
simp only [centerMass, sum_pair hne]
module
variable {w}
theorem Finset.centerMass_insert [DecidableEq ι] (ha : i ∉ t) (hw : ∑ j ∈ t, w j ≠ 0) :
(insert i t).centerMass w z =
(w i / (w i + ∑ j ∈ t, w j)) • z i +
((∑ j ∈ t, w j) / (w i + ∑ j ∈ t, w j)) • t.centerMass w z := by
simp only [centerMass, sum_insert ha, smul_add, (mul_smul _ _ _).symm, ← div_eq_inv_mul]
congr 2
rw [div_mul_eq_mul_div, mul_inv_cancel₀ hw, one_div]
theorem Finset.centerMass_singleton (hw : w i ≠ 0) : ({i} : Finset ι).centerMass w z = z i := by
rw [centerMass, sum_singleton, sum_singleton]
match_scalars
field_simp
@[simp] lemma Finset.centerMass_neg_left : t.centerMass (-w) z = t.centerMass w z := by
simp [centerMass, inv_neg]
lemma Finset.centerMass_smul_left {c : R'} [Module R' R] [Module R' E] [SMulCommClass R' R R]
[IsScalarTower R' R R] [SMulCommClass R R' E] [IsScalarTower R' R E] (hc : c ≠ 0) :
t.centerMass (c • w) z = t.centerMass w z := by
simp [centerMass, -smul_assoc, smul_assoc c, ← smul_sum, smul_inv₀, smul_smul_smul_comm, hc]
theorem Finset.centerMass_eq_of_sum_1 (hw : ∑ i ∈ t, w i = 1) :
t.centerMass w z = ∑ i ∈ t, w i • z i := by
simp only [Finset.centerMass, hw, inv_one, one_smul]
theorem Finset.centerMass_smul : (t.centerMass w fun i => c • z i) = c • t.centerMass w z := by
simp only [Finset.centerMass, Finset.smul_sum, (mul_smul _ _ _).symm, mul_comm c, mul_assoc]
/-- A convex combination of two centers of mass is a center of mass as well. This version
deals with two different index types. -/
theorem Finset.centerMass_segment' (s : Finset ι) (t : Finset ι') (ws : ι → R) (zs : ι → E)
(wt : ι' → R) (zt : ι' → E) (hws : ∑ i ∈ s, ws i = 1) (hwt : ∑ i ∈ t, wt i = 1) (a b : R)
(hab : a + b = 1) : a • s.centerMass ws zs + b • t.centerMass wt zt = (s.disjSum t).centerMass
(Sum.elim (fun i => a * ws i) fun j => b * wt j) (Sum.elim zs zt) := by
rw [s.centerMass_eq_of_sum_1 _ hws, t.centerMass_eq_of_sum_1 _ hwt, smul_sum, smul_sum, ←
Finset.sum_sumElim, Finset.centerMass_eq_of_sum_1]
· congr with ⟨⟩ <;> simp only [Sum.elim_inl, Sum.elim_inr, mul_smul]
· rw [sum_sumElim, ← mul_sum, ← mul_sum, hws, hwt, mul_one, mul_one, hab]
/-- A convex combination of two centers of mass is a center of mass as well. This version
works if two centers of mass share the set of original points. -/
theorem Finset.centerMass_segment (s : Finset ι) (w₁ w₂ : ι → R) (z : ι → E)
(hw₁ : ∑ i ∈ s, w₁ i = 1) (hw₂ : ∑ i ∈ s, w₂ i = 1) (a b : R) (hab : a + b = 1) :
a • s.centerMass w₁ z + b • s.centerMass w₂ z =
s.centerMass (fun i => a * w₁ i + b * w₂ i) z := by
have hw : (∑ i ∈ s, (a * w₁ i + b * w₂ i)) = 1 := by
simp only [← mul_sum, sum_add_distrib, mul_one, *]
simp only [Finset.centerMass_eq_of_sum_1, Finset.centerMass_eq_of_sum_1 _ _ hw,
smul_sum, sum_add_distrib, add_smul, mul_smul, *]
theorem Finset.centerMass_ite_eq [DecidableEq ι] (hi : i ∈ t) :
t.centerMass (fun j => if i = j then (1 : R) else 0) z = z i := by
rw [Finset.centerMass_eq_of_sum_1]
· trans ∑ j ∈ t, if i = j then z i else 0
· congr with i
split_ifs with h
exacts [h ▸ one_smul _ _, zero_smul _ _]
· rw [sum_ite_eq, if_pos hi]
· rw [sum_ite_eq, if_pos hi]
variable {t}
theorem Finset.centerMass_subset {t' : Finset ι} (ht : t ⊆ t') (h : ∀ i ∈ t', i ∉ t → w i = 0) :
t.centerMass w z = t'.centerMass w z := by
rw [centerMass, sum_subset ht h, smul_sum, centerMass, smul_sum]
apply sum_subset ht
intro i hit' hit
rw [h i hit' hit, zero_smul, smul_zero]
theorem Finset.centerMass_filter_ne_zero [∀ i, Decidable (w i ≠ 0)] :
{i ∈ t | w i ≠ 0}.centerMass w z = t.centerMass w z :=
Finset.centerMass_subset z (filter_subset _ _) fun i hit hit' => by
simpa only [hit, mem_filter, true_and, Ne, Classical.not_not] using hit'
namespace Finset
variable [LinearOrder R] [IsStrictOrderedRing R] [IsOrderedAddMonoid α] [OrderedSMul R α]
theorem centerMass_le_sup {s : Finset ι} {f : ι → α} {w : ι → R} (hw₀ : ∀ i ∈ s, 0 ≤ w i)
(hw₁ : 0 < ∑ i ∈ s, w i) :
s.centerMass w f ≤ s.sup' (nonempty_of_ne_empty <| by rintro rfl; simp at hw₁) f := by
rw [centerMass, inv_smul_le_iff_of_pos hw₁, sum_smul]
exact sum_le_sum fun i hi => smul_le_smul_of_nonneg_left (le_sup' _ hi) <| hw₀ i hi
theorem inf_le_centerMass {s : Finset ι} {f : ι → α} {w : ι → R} (hw₀ : ∀ i ∈ s, 0 ≤ w i)
(hw₁ : 0 < ∑ i ∈ s, w i) :
s.inf' (nonempty_of_ne_empty <| by rintro rfl; simp at hw₁) f ≤ s.centerMass w f :=
centerMass_le_sup (α := αᵒᵈ) hw₀ hw₁
end Finset
variable {z}
lemma Finset.centerMass_of_sum_add_sum_eq_zero {s t : Finset ι}
(hw : ∑ i ∈ s, w i + ∑ i ∈ t, w i = 0) (hz : ∑ i ∈ s, w i • z i + ∑ i ∈ t, w i • z i = 0) :
s.centerMass w z = t.centerMass w z := by
simp [centerMass, eq_neg_of_add_eq_zero_right hw, eq_neg_of_add_eq_zero_left hz, ← neg_inv]
variable [LinearOrder R] [IsStrictOrderedRing R] [IsOrderedAddMonoid α] [OrderedSMul R α]
/-- The center of mass of a finite subset of a convex set belongs to the set
provided that all weights are non-negative, and the total weight is positive. -/
theorem Convex.centerMass_mem (hs : Convex R s) :
(∀ i ∈ t, 0 ≤ w i) → (0 < ∑ i ∈ t, w i) → (∀ i ∈ t, z i ∈ s) → t.centerMass w z ∈ s := by
classical
induction' t using Finset.induction with i t hi ht
· simp [lt_irrefl]
intro h₀ hpos hmem
have zi : z i ∈ s := hmem _ (mem_insert_self _ _)
have hs₀ : ∀ j ∈ t, 0 ≤ w j := fun j hj => h₀ j <| mem_insert_of_mem hj
rw [sum_insert hi] at hpos
by_cases hsum_t : ∑ j ∈ t, w j = 0
· have ws : ∀ j ∈ t, w j = 0 := (sum_eq_zero_iff_of_nonneg hs₀).1 hsum_t
have wz : ∑ j ∈ t, w j • z j = 0 := sum_eq_zero fun i hi => by simp [ws i hi]
simp only [centerMass, sum_insert hi, wz, hsum_t, add_zero]
simp only [hsum_t, add_zero] at hpos
rw [← mul_smul, inv_mul_cancel₀ (ne_of_gt hpos), one_smul]
exact zi
· rw [Finset.centerMass_insert _ _ _ hi hsum_t]
refine convex_iff_div.1 hs zi (ht hs₀ ?_ ?_) ?_ (sum_nonneg hs₀) hpos
· exact lt_of_le_of_ne (sum_nonneg hs₀) (Ne.symm hsum_t)
· intro j hj
exact hmem j (mem_insert_of_mem hj)
· exact h₀ _ (mem_insert_self _ _)
theorem Convex.sum_mem (hs : Convex R s) (h₀ : ∀ i ∈ t, 0 ≤ w i) (h₁ : ∑ i ∈ t, w i = 1)
(hz : ∀ i ∈ t, z i ∈ s) : (∑ i ∈ t, w i • z i) ∈ s := by
simpa only [h₁, centerMass, inv_one, one_smul] using
hs.centerMass_mem h₀ (h₁.symm ▸ zero_lt_one) hz
/-- A version of `Convex.sum_mem` for `finsum`s. If `s` is a convex set, `w : ι → R` is a family of
nonnegative weights with sum one and `z : ι → E` is a family of elements of a module over `R` such
that `z i ∈ s` whenever `w i ≠ 0`, then the sum `∑ᶠ i, w i • z i` belongs to `s`. See also
`PartitionOfUnity.finsum_smul_mem_convex`. -/
theorem Convex.finsum_mem {ι : Sort*} {w : ι → R} {z : ι → E} {s : Set E} (hs : Convex R s)
(h₀ : ∀ i, 0 ≤ w i) (h₁ : ∑ᶠ i, w i = 1) (hz : ∀ i, w i ≠ 0 → z i ∈ s) :
(∑ᶠ i, w i • z i) ∈ s := by
have hfin_w : (support (w ∘ PLift.down)).Finite := by
by_contra H
rw [finsum, dif_neg H] at h₁
exact zero_ne_one h₁
have hsub : support ((fun i => w i • z i) ∘ PLift.down) ⊆ hfin_w.toFinset :=
(support_smul_subset_left _ _).trans hfin_w.coe_toFinset.ge
rw [finsum_eq_sum_plift_of_support_subset hsub]
refine hs.sum_mem (fun _ _ => h₀ _) ?_ fun i hi => hz _ ?_
· rwa [finsum, dif_pos hfin_w] at h₁
· rwa [hfin_w.mem_toFinset] at hi
theorem convex_iff_sum_mem : Convex R s ↔ ∀ (t : Finset E) (w : E → R),
(∀ i ∈ t, 0 ≤ w i) → ∑ i ∈ t, w i = 1 → (∀ x ∈ t, x ∈ s) → (∑ x ∈ t, w x • x) ∈ s := by
classical
refine ⟨fun hs t w hw₀ hw₁ hts => hs.sum_mem hw₀ hw₁ hts, ?_⟩
intro h x hx y hy a b ha hb hab
by_cases h_cases : x = y
· rw [h_cases, ← add_smul, hab, one_smul]
exact hy
· convert h {x, y} (fun z => if z = y then b else a) _ _ _
· simp only [sum_pair h_cases, if_neg h_cases, if_pos trivial]
· intro i _
simp only
split_ifs <;> assumption
· simp only [sum_pair h_cases, if_neg h_cases, if_pos trivial, hab]
· intro i hi
simp only [Finset.mem_singleton, Finset.mem_insert] at hi
cases hi <;> subst i <;> assumption
theorem Finset.centerMass_mem_convexHull (t : Finset ι) {w : ι → R} (hw₀ : ∀ i ∈ t, 0 ≤ w i)
(hws : 0 < ∑ i ∈ t, w i) {z : ι → E} (hz : ∀ i ∈ t, z i ∈ s) :
t.centerMass w z ∈ convexHull R s :=
(convex_convexHull R s).centerMass_mem hw₀ hws fun i hi => subset_convexHull R s <| hz i hi
/-- A version of `Finset.centerMass_mem_convexHull` for when the weights are nonpositive. -/
lemma Finset.centerMass_mem_convexHull_of_nonpos (t : Finset ι) (hw₀ : ∀ i ∈ t, w i ≤ 0)
(hws : ∑ i ∈ t, w i < 0) (hz : ∀ i ∈ t, z i ∈ s) : t.centerMass w z ∈ convexHull R s := by
rw [← centerMass_neg_left]
exact Finset.centerMass_mem_convexHull _ (fun _i hi ↦ neg_nonneg.2 <| hw₀ _ hi) (by simpa) hz
/-- A refinement of `Finset.centerMass_mem_convexHull` when the indexed family is a `Finset` of
the space. -/
theorem Finset.centerMass_id_mem_convexHull (t : Finset E) {w : E → R} (hw₀ : ∀ i ∈ t, 0 ≤ w i)
(hws : 0 < ∑ i ∈ t, w i) : t.centerMass w id ∈ convexHull R (t : Set E) :=
t.centerMass_mem_convexHull hw₀ hws fun _ => mem_coe.2
/-- A version of `Finset.centerMass_mem_convexHull` for when the weights are nonpositive. -/
lemma Finset.centerMass_id_mem_convexHull_of_nonpos (t : Finset E) {w : E → R}
(hw₀ : ∀ i ∈ t, w i ≤ 0) (hws : ∑ i ∈ t, w i < 0) :
t.centerMass w id ∈ convexHull R (t : Set E) :=
| t.centerMass_mem_convexHull_of_nonpos hw₀ hws fun _ ↦ mem_coe.2
omit [LinearOrder R] [IsStrictOrderedRing R] in
theorem affineCombination_eq_centerMass {ι : Type*} {t : Finset ι} {p : ι → E} {w : ι → R}
(hw₂ : ∑ i ∈ t, w i = 1) : t.affineCombination R p w = centerMass t w p := by
| Mathlib/Analysis/Convex/Combination.lean | 241 | 245 |
/-
Copyright (c) 2020 Aaron Anderson, Jalex Stark, Kyle Miller. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Aaron Anderson, Jalex Stark, Kyle Miller, Alena Gusakov, Hunter Monroe
-/
import Mathlib.Combinatorics.SimpleGraph.Init
import Mathlib.Data.Finite.Prod
import Mathlib.Data.Rel
import Mathlib.Data.Set.Finite.Basic
import Mathlib.Data.Sym.Sym2
/-!
# Simple graphs
This module defines simple graphs on a vertex type `V` as an irreflexive symmetric relation.
## Main definitions
* `SimpleGraph` is a structure for symmetric, irreflexive relations.
* `SimpleGraph.neighborSet` is the `Set` of vertices adjacent to a given vertex.
* `SimpleGraph.commonNeighbors` is the intersection of the neighbor sets of two given vertices.
* `SimpleGraph.incidenceSet` is the `Set` of edges containing a given vertex.
* `CompleteAtomicBooleanAlgebra` instance: Under the subgraph relation, `SimpleGraph` forms a
`CompleteAtomicBooleanAlgebra`. In other words, this is the complete lattice of spanning subgraphs
of the complete graph.
## TODO
* This is the simplest notion of an unoriented graph.
This should eventually fit into a more complete combinatorics hierarchy which includes
multigraphs and directed graphs.
We begin with simple graphs in order to start learning what the combinatorics hierarchy should
look like.
-/
attribute [aesop norm unfold (rule_sets := [SimpleGraph])] Symmetric
attribute [aesop norm unfold (rule_sets := [SimpleGraph])] Irreflexive
/--
A variant of the `aesop` tactic for use in the graph library. Changes relative
to standard `aesop`:
- We use the `SimpleGraph` rule set in addition to the default rule sets.
- We instruct Aesop's `intro` rule to unfold with `default` transparency.
- We instruct Aesop to fail if it can't fully solve the goal. This allows us to
use `aesop_graph` for auto-params.
-/
macro (name := aesop_graph) "aesop_graph" c:Aesop.tactic_clause* : tactic =>
`(tactic|
aesop $c*
(config := { introsTransparency? := some .default, terminal := true })
(rule_sets := [$(Lean.mkIdent `SimpleGraph):ident]))
/--
Use `aesop_graph?` to pass along a `Try this` suggestion when using `aesop_graph`
-/
macro (name := aesop_graph?) "aesop_graph?" c:Aesop.tactic_clause* : tactic =>
`(tactic|
aesop? $c*
(config := { introsTransparency? := some .default, terminal := true })
(rule_sets := [$(Lean.mkIdent `SimpleGraph):ident]))
/--
A variant of `aesop_graph` which does not fail if it is unable to solve the goal.
Use this only for exploration! Nonterminal Aesop is even worse than nonterminal `simp`.
-/
macro (name := aesop_graph_nonterminal) "aesop_graph_nonterminal" c:Aesop.tactic_clause* : tactic =>
`(tactic|
aesop $c*
(config := { introsTransparency? := some .default, warnOnNonterminal := false })
(rule_sets := [$(Lean.mkIdent `SimpleGraph):ident]))
open Finset Function
universe u v w
/-- A simple graph is an irreflexive symmetric relation `Adj` on a vertex type `V`.
The relation describes which pairs of vertices are adjacent.
There is exactly one edge for every pair of adjacent vertices;
see `SimpleGraph.edgeSet` for the corresponding edge set.
-/
@[ext, aesop safe constructors (rule_sets := [SimpleGraph])]
structure SimpleGraph (V : Type u) where
/-- The adjacency relation of a simple graph. -/
Adj : V → V → Prop
symm : Symmetric Adj := by aesop_graph
loopless : Irreflexive Adj := by aesop_graph
initialize_simps_projections SimpleGraph (Adj → adj)
/-- Constructor for simple graphs using a symmetric irreflexive boolean function. -/
@[simps]
def SimpleGraph.mk' {V : Type u} :
{adj : V → V → Bool // (∀ x y, adj x y = adj y x) ∧ (∀ x, ¬ adj x x)} ↪ SimpleGraph V where
toFun x := ⟨fun v w ↦ x.1 v w, fun v w ↦ by simp [x.2.1], fun v ↦ by simp [x.2.2]⟩
inj' := by
rintro ⟨adj, _⟩ ⟨adj', _⟩
simp only [mk.injEq, Subtype.mk.injEq]
intro h
funext v w
simpa [Bool.coe_iff_coe] using congr_fun₂ h v w
/-- We can enumerate simple graphs by enumerating all functions `V → V → Bool`
and filtering on whether they are symmetric and irreflexive. -/
instance {V : Type u} [Fintype V] [DecidableEq V] : Fintype (SimpleGraph V) where
elems := Finset.univ.map SimpleGraph.mk'
complete := by
classical
rintro ⟨Adj, hs, hi⟩
simp only [mem_map, mem_univ, true_and, Subtype.exists, Bool.not_eq_true]
refine ⟨fun v w ↦ Adj v w, ⟨?_, ?_⟩, ?_⟩
· simp [hs.iff]
· intro v; simp [hi v]
· ext
simp
/-- There are finitely many simple graphs on a given finite type. -/
instance SimpleGraph.instFinite {V : Type u} [Finite V] : Finite (SimpleGraph V) :=
.of_injective SimpleGraph.Adj fun _ _ ↦ SimpleGraph.ext
/-- Construct the simple graph induced by the given relation. It
symmetrizes the relation and makes it irreflexive. -/
def SimpleGraph.fromRel {V : Type u} (r : V → V → Prop) : SimpleGraph V where
Adj a b := a ≠ b ∧ (r a b ∨ r b a)
symm := fun _ _ ⟨hn, hr⟩ => ⟨hn.symm, hr.symm⟩
loopless := fun _ ⟨hn, _⟩ => hn rfl
@[simp]
theorem SimpleGraph.fromRel_adj {V : Type u} (r : V → V → Prop) (v w : V) :
(SimpleGraph.fromRel r).Adj v w ↔ v ≠ w ∧ (r v w ∨ r w v) :=
Iff.rfl
attribute [aesop safe (rule_sets := [SimpleGraph])] Ne.symm
attribute [aesop safe (rule_sets := [SimpleGraph])] Ne.irrefl
/-- The complete graph on a type `V` is the simple graph with all pairs of distinct vertices
adjacent. In `Mathlib`, this is usually referred to as `⊤`. -/
def completeGraph (V : Type u) : SimpleGraph V where Adj := Ne
/-- The graph with no edges on a given vertex type `V`. `Mathlib` prefers the notation `⊥`. -/
def emptyGraph (V : Type u) : SimpleGraph V where Adj _ _ := False
/-- Two vertices are adjacent in the complete bipartite graph on two vertex types
if and only if they are not from the same side.
Any bipartite graph may be regarded as a subgraph of one of these. -/
@[simps]
def completeBipartiteGraph (V W : Type*) : SimpleGraph (V ⊕ W) where
Adj v w := v.isLeft ∧ w.isRight ∨ v.isRight ∧ w.isLeft
symm v w := by cases v <;> cases w <;> simp
loopless v := by cases v <;> simp
namespace SimpleGraph
variable {ι : Sort*} {V : Type u} (G : SimpleGraph V) {a b c u v w : V} {e : Sym2 V}
@[simp]
protected theorem irrefl {v : V} : ¬G.Adj v v :=
G.loopless v
theorem adj_comm (u v : V) : G.Adj u v ↔ G.Adj v u :=
⟨fun x => G.symm x, fun x => G.symm x⟩
@[symm]
theorem adj_symm (h : G.Adj u v) : G.Adj v u :=
G.symm h
theorem Adj.symm {G : SimpleGraph V} {u v : V} (h : G.Adj u v) : G.Adj v u :=
G.symm h
theorem ne_of_adj (h : G.Adj a b) : a ≠ b := by
rintro rfl
exact G.irrefl h
protected theorem Adj.ne {G : SimpleGraph V} {a b : V} (h : G.Adj a b) : a ≠ b :=
G.ne_of_adj h
protected theorem Adj.ne' {G : SimpleGraph V} {a b : V} (h : G.Adj a b) : b ≠ a :=
h.ne.symm
theorem ne_of_adj_of_not_adj {v w x : V} (h : G.Adj v x) (hn : ¬G.Adj w x) : v ≠ w := fun h' =>
hn (h' ▸ h)
theorem adj_injective : Injective (Adj : SimpleGraph V → V → V → Prop) :=
fun _ _ => SimpleGraph.ext
@[simp]
theorem adj_inj {G H : SimpleGraph V} : G.Adj = H.Adj ↔ G = H :=
adj_injective.eq_iff
theorem adj_congr_of_sym2 {u v w x : V} (h : s(u, v) = s(w, x)) : G.Adj u v ↔ G.Adj w x := by
simp only [Sym2.eq, Sym2.rel_iff', Prod.mk.injEq, Prod.swap_prod_mk] at h
rcases h with hl | hr
· rw [hl.1, hl.2]
· rw [hr.1, hr.2, adj_comm]
section Order
/-- The relation that one `SimpleGraph` is a subgraph of another.
Note that this should be spelled `≤`. -/
def IsSubgraph (x y : SimpleGraph V) : Prop :=
∀ ⦃v w : V⦄, x.Adj v w → y.Adj v w
instance : LE (SimpleGraph V) :=
⟨IsSubgraph⟩
@[simp]
theorem isSubgraph_eq_le : (IsSubgraph : SimpleGraph V → SimpleGraph V → Prop) = (· ≤ ·) :=
rfl
/-- The supremum of two graphs `x ⊔ y` has edges where either `x` or `y` have edges. -/
instance : Max (SimpleGraph V) where
max x y :=
{ Adj := x.Adj ⊔ y.Adj
symm := fun v w h => by rwa [Pi.sup_apply, Pi.sup_apply, x.adj_comm, y.adj_comm] }
@[simp]
theorem sup_adj (x y : SimpleGraph V) (v w : V) : (x ⊔ y).Adj v w ↔ x.Adj v w ∨ y.Adj v w :=
Iff.rfl
/-- The infimum of two graphs `x ⊓ y` has edges where both `x` and `y` have edges. -/
instance : Min (SimpleGraph V) where
min x y :=
{ Adj := x.Adj ⊓ y.Adj
symm := fun v w h => by rwa [Pi.inf_apply, Pi.inf_apply, x.adj_comm, y.adj_comm] }
@[simp]
theorem inf_adj (x y : SimpleGraph V) (v w : V) : (x ⊓ y).Adj v w ↔ x.Adj v w ∧ y.Adj v w :=
Iff.rfl
/-- We define `Gᶜ` to be the `SimpleGraph V` such that no two adjacent vertices in `G`
are adjacent in the complement, and every nonadjacent pair of vertices is adjacent
(still ensuring that vertices are not adjacent to themselves). -/
instance hasCompl : HasCompl (SimpleGraph V) where
compl G :=
{ Adj := fun v w => v ≠ w ∧ ¬G.Adj v w
symm := fun v w ⟨hne, _⟩ => ⟨hne.symm, by rwa [adj_comm]⟩
loopless := fun _ ⟨hne, _⟩ => (hne rfl).elim }
@[simp]
theorem compl_adj (G : SimpleGraph V) (v w : V) : Gᶜ.Adj v w ↔ v ≠ w ∧ ¬G.Adj v w :=
Iff.rfl
/-- The difference of two graphs `x \ y` has the edges of `x` with the edges of `y` removed. -/
instance sdiff : SDiff (SimpleGraph V) where
sdiff x y :=
{ Adj := x.Adj \ y.Adj
symm := fun v w h => by change x.Adj w v ∧ ¬y.Adj w v; rwa [x.adj_comm, y.adj_comm] }
@[simp]
theorem sdiff_adj (x y : SimpleGraph V) (v w : V) : (x \ y).Adj v w ↔ x.Adj v w ∧ ¬y.Adj v w :=
Iff.rfl
instance supSet : SupSet (SimpleGraph V) where
sSup s :=
{ Adj := fun a b => ∃ G ∈ s, Adj G a b
symm := fun _ _ => Exists.imp fun _ => And.imp_right Adj.symm
loopless := by
rintro a ⟨G, _, ha⟩
exact ha.ne rfl }
instance infSet : InfSet (SimpleGraph V) where
sInf s :=
{ Adj := fun a b => (∀ ⦃G⦄, G ∈ s → Adj G a b) ∧ a ≠ b
symm := fun _ _ => And.imp (forall₂_imp fun _ _ => Adj.symm) Ne.symm
loopless := fun _ h => h.2 rfl }
@[simp]
theorem sSup_adj {s : Set (SimpleGraph V)} {a b : V} : (sSup s).Adj a b ↔ ∃ G ∈ s, Adj G a b :=
Iff.rfl
@[simp]
theorem sInf_adj {s : Set (SimpleGraph V)} : (sInf s).Adj a b ↔ (∀ G ∈ s, Adj G a b) ∧ a ≠ b :=
Iff.rfl
@[simp]
theorem iSup_adj {f : ι → SimpleGraph V} : (⨆ i, f i).Adj a b ↔ ∃ i, (f i).Adj a b := by simp [iSup]
@[simp]
theorem iInf_adj {f : ι → SimpleGraph V} : (⨅ i, f i).Adj a b ↔ (∀ i, (f i).Adj a b) ∧ a ≠ b := by
simp [iInf]
theorem sInf_adj_of_nonempty {s : Set (SimpleGraph V)} (hs : s.Nonempty) :
(sInf s).Adj a b ↔ ∀ G ∈ s, Adj G a b :=
sInf_adj.trans <|
and_iff_left_of_imp <| by
obtain ⟨G, hG⟩ := hs
exact fun h => (h _ hG).ne
theorem iInf_adj_of_nonempty [Nonempty ι] {f : ι → SimpleGraph V} :
(⨅ i, f i).Adj a b ↔ ∀ i, (f i).Adj a b := by
rw [iInf, sInf_adj_of_nonempty (Set.range_nonempty _), Set.forall_mem_range]
/-- For graphs `G`, `H`, `G ≤ H` iff `∀ a b, G.Adj a b → H.Adj a b`. -/
instance distribLattice : DistribLattice (SimpleGraph V) :=
{ show DistribLattice (SimpleGraph V) from
adj_injective.distribLattice _ (fun _ _ => rfl) fun _ _ => rfl with
le := fun G H => ∀ ⦃a b⦄, G.Adj a b → H.Adj a b }
instance completeAtomicBooleanAlgebra : CompleteAtomicBooleanAlgebra (SimpleGraph V) :=
{ SimpleGraph.distribLattice with
le := (· ≤ ·)
sup := (· ⊔ ·)
inf := (· ⊓ ·)
compl := HasCompl.compl
sdiff := (· \ ·)
top := completeGraph V
bot := emptyGraph V
le_top := fun x _ _ h => x.ne_of_adj h
bot_le := fun _ _ _ h => h.elim
sdiff_eq := fun x y => by
ext v w
refine ⟨fun h => ⟨h.1, ⟨?_, h.2⟩⟩, fun h => ⟨h.1, h.2.2⟩⟩
rintro rfl
exact x.irrefl h.1
inf_compl_le_bot := fun _ _ _ h => False.elim <| h.2.2 h.1
top_le_sup_compl := fun G v w hvw => by
by_cases h : G.Adj v w
· exact Or.inl h
· exact Or.inr ⟨hvw, h⟩
sSup := sSup
le_sSup := fun _ G hG _ _ hab => ⟨G, hG, hab⟩
sSup_le := fun s G hG a b => by
rintro ⟨H, hH, hab⟩
exact hG _ hH hab
sInf := sInf
sInf_le := fun _ _ hG _ _ hab => hab.1 hG
le_sInf := fun _ _ hG _ _ hab => ⟨fun _ hH => hG _ hH hab, hab.ne⟩
iInf_iSup_eq := fun f => by ext; simp [Classical.skolem] }
@[simp]
theorem top_adj (v w : V) : (⊤ : SimpleGraph V).Adj v w ↔ v ≠ w :=
Iff.rfl
@[simp]
theorem bot_adj (v w : V) : (⊥ : SimpleGraph V).Adj v w ↔ False :=
Iff.rfl
@[simp]
theorem completeGraph_eq_top (V : Type u) : completeGraph V = ⊤ :=
rfl
@[simp]
theorem emptyGraph_eq_bot (V : Type u) : emptyGraph V = ⊥ :=
rfl
@[simps]
instance (V : Type u) : Inhabited (SimpleGraph V) :=
⟨⊥⟩
instance [Subsingleton V] : Unique (SimpleGraph V) where
default := ⊥
uniq G := by ext a b; have := Subsingleton.elim a b; simp [this]
instance [Nontrivial V] : Nontrivial (SimpleGraph V) :=
⟨⟨⊥, ⊤, fun h ↦ not_subsingleton V ⟨by simpa only [← adj_inj, funext_iff, bot_adj,
top_adj, ne_eq, eq_iff_iff, false_iff, not_not] using h⟩⟩⟩
section Decidable
variable (V) (H : SimpleGraph V) [DecidableRel G.Adj] [DecidableRel H.Adj]
instance Bot.adjDecidable : DecidableRel (⊥ : SimpleGraph V).Adj :=
inferInstanceAs <| DecidableRel fun _ _ => False
instance Sup.adjDecidable : DecidableRel (G ⊔ H).Adj :=
inferInstanceAs <| DecidableRel fun v w => G.Adj v w ∨ H.Adj v w
instance Inf.adjDecidable : DecidableRel (G ⊓ H).Adj :=
inferInstanceAs <| DecidableRel fun v w => G.Adj v w ∧ H.Adj v w
instance Sdiff.adjDecidable : DecidableRel (G \ H).Adj :=
inferInstanceAs <| DecidableRel fun v w => G.Adj v w ∧ ¬H.Adj v w
variable [DecidableEq V]
instance Top.adjDecidable : DecidableRel (⊤ : SimpleGraph V).Adj :=
inferInstanceAs <| DecidableRel fun v w => v ≠ w
instance Compl.adjDecidable : DecidableRel (Gᶜ.Adj) :=
inferInstanceAs <| DecidableRel fun v w => v ≠ w ∧ ¬G.Adj v w
end Decidable
end Order
/-- `G.support` is the set of vertices that form edges in `G`. -/
def support : Set V :=
Rel.dom G.Adj
theorem mem_support {v : V} : v ∈ G.support ↔ ∃ w, G.Adj v w :=
Iff.rfl
theorem support_mono {G G' : SimpleGraph V} (h : G ≤ G') : G.support ⊆ G'.support :=
Rel.dom_mono h
/-- `G.neighborSet v` is the set of vertices adjacent to `v` in `G`. -/
def neighborSet (v : V) : Set V := {w | G.Adj v w}
instance neighborSet.memDecidable (v : V) [DecidableRel G.Adj] :
DecidablePred (· ∈ G.neighborSet v) :=
inferInstanceAs <| DecidablePred (Adj G v)
lemma neighborSet_subset_support (v : V) : G.neighborSet v ⊆ G.support :=
fun _ hadj ↦ ⟨v, hadj.symm⟩
section EdgeSet
variable {G₁ G₂ : SimpleGraph V}
/-- The edges of G consist of the unordered pairs of vertices related by
`G.Adj`. This is the order embedding; for the edge set of a particular graph, see
`SimpleGraph.edgeSet`.
The way `edgeSet` is defined is such that `mem_edgeSet` is proved by `Iff.rfl`.
(That is, `s(v, w) ∈ G.edgeSet` is definitionally equal to `G.Adj v w`.)
-/
-- Porting note: We need a separate definition so that dot notation works.
def edgeSetEmbedding (V : Type*) : SimpleGraph V ↪o Set (Sym2 V) :=
OrderEmbedding.ofMapLEIff (fun G => Sym2.fromRel G.symm) fun _ _ =>
⟨fun h a b => @h s(a, b), fun h e => Sym2.ind @h e⟩
/-- `G.edgeSet` is the edge set for `G`.
This is an abbreviation for `edgeSetEmbedding G` that permits dot notation. -/
abbrev edgeSet (G : SimpleGraph V) : Set (Sym2 V) := edgeSetEmbedding V G
@[simp]
theorem mem_edgeSet : s(v, w) ∈ G.edgeSet ↔ G.Adj v w :=
Iff.rfl
theorem not_isDiag_of_mem_edgeSet : e ∈ edgeSet G → ¬e.IsDiag :=
Sym2.ind (fun _ _ => Adj.ne) e
theorem edgeSet_inj : G₁.edgeSet = G₂.edgeSet ↔ G₁ = G₂ := (edgeSetEmbedding V).eq_iff_eq
@[simp]
theorem edgeSet_subset_edgeSet : edgeSet G₁ ⊆ edgeSet G₂ ↔ G₁ ≤ G₂ :=
(edgeSetEmbedding V).le_iff_le
@[simp]
theorem edgeSet_ssubset_edgeSet : edgeSet G₁ ⊂ edgeSet G₂ ↔ G₁ < G₂ :=
(edgeSetEmbedding V).lt_iff_lt
theorem edgeSet_injective : Injective (edgeSet : SimpleGraph V → Set (Sym2 V)) :=
(edgeSetEmbedding V).injective
alias ⟨_, edgeSet_mono⟩ := edgeSet_subset_edgeSet
alias ⟨_, edgeSet_strict_mono⟩ := edgeSet_ssubset_edgeSet
attribute [mono] edgeSet_mono edgeSet_strict_mono
variable (G₁ G₂)
@[simp]
theorem edgeSet_bot : (⊥ : SimpleGraph V).edgeSet = ∅ :=
Sym2.fromRel_bot
@[simp]
theorem edgeSet_top : (⊤ : SimpleGraph V).edgeSet = {e | ¬e.IsDiag} :=
Sym2.fromRel_ne
@[simp]
theorem edgeSet_subset_setOf_not_isDiag : G.edgeSet ⊆ {e | ¬e.IsDiag} :=
fun _ h => (Sym2.fromRel_irreflexive (sym := G.symm)).mp G.loopless h
@[simp]
theorem edgeSet_sup : (G₁ ⊔ G₂).edgeSet = G₁.edgeSet ∪ G₂.edgeSet := by
ext ⟨x, y⟩
rfl
@[simp]
theorem edgeSet_inf : (G₁ ⊓ G₂).edgeSet = G₁.edgeSet ∩ G₂.edgeSet := by
ext ⟨x, y⟩
rfl
@[simp]
theorem edgeSet_sdiff : (G₁ \ G₂).edgeSet = G₁.edgeSet \ G₂.edgeSet := by
ext ⟨x, y⟩
rfl
variable {G G₁ G₂}
@[simp] lemma disjoint_edgeSet : Disjoint G₁.edgeSet G₂.edgeSet ↔ Disjoint G₁ G₂ := by
rw [Set.disjoint_iff, disjoint_iff_inf_le, ← edgeSet_inf, ← edgeSet_bot, ← Set.le_iff_subset,
OrderEmbedding.le_iff_le]
@[simp] lemma edgeSet_eq_empty : G.edgeSet = ∅ ↔ G = ⊥ := by rw [← edgeSet_bot, edgeSet_inj]
@[simp] lemma edgeSet_nonempty : G.edgeSet.Nonempty ↔ G ≠ ⊥ := by
rw [Set.nonempty_iff_ne_empty, edgeSet_eq_empty.ne]
/-- This lemma, combined with `edgeSet_sdiff` and `edgeSet_from_edgeSet`,
allows proving `(G \ from_edgeSet s).edge_set = G.edgeSet \ s` by `simp`. -/
@[simp]
theorem edgeSet_sdiff_sdiff_isDiag (G : SimpleGraph V) (s : Set (Sym2 V)) :
G.edgeSet \ (s \ { e | e.IsDiag }) = G.edgeSet \ s := by
ext e
simp only [Set.mem_diff, Set.mem_setOf_eq, not_and, not_not, and_congr_right_iff]
intro h
simp only [G.not_isDiag_of_mem_edgeSet h, imp_false]
/-- Two vertices are adjacent iff there is an edge between them. The
condition `v ≠ w` ensures they are different endpoints of the edge,
which is necessary since when `v = w` the existential
`∃ (e ∈ G.edgeSet), v ∈ e ∧ w ∈ e` is satisfied by every edge
incident to `v`. -/
theorem adj_iff_exists_edge {v w : V} : G.Adj v w ↔ v ≠ w ∧ ∃ e ∈ G.edgeSet, v ∈ e ∧ w ∈ e := by
refine ⟨fun _ => ⟨G.ne_of_adj ‹_›, s(v, w), by simpa⟩, ?_⟩
rintro ⟨hne, e, he, hv⟩
rw [Sym2.mem_and_mem_iff hne] at hv
subst e
rwa [mem_edgeSet] at he
theorem adj_iff_exists_edge_coe : G.Adj a b ↔ ∃ e : G.edgeSet, e.val = s(a, b) := by
simp only [mem_edgeSet, exists_prop, SetCoe.exists, exists_eq_right, Subtype.coe_mk]
variable (G G₁ G₂)
theorem edge_other_ne {e : Sym2 V} (he : e ∈ G.edgeSet) {v : V} (h : v ∈ e) :
Sym2.Mem.other h ≠ v := by
rw [← Sym2.other_spec h, Sym2.eq_swap] at he
exact G.ne_of_adj he
instance decidableMemEdgeSet [DecidableRel G.Adj] : DecidablePred (· ∈ G.edgeSet) :=
Sym2.fromRel.decidablePred G.symm
instance fintypeEdgeSet [Fintype (Sym2 V)] [DecidableRel G.Adj] : Fintype G.edgeSet :=
Subtype.fintype _
instance fintypeEdgeSetBot : Fintype (⊥ : SimpleGraph V).edgeSet := by
rw [edgeSet_bot]
infer_instance
instance fintypeEdgeSetSup [DecidableEq V] [Fintype G₁.edgeSet] [Fintype G₂.edgeSet] :
Fintype (G₁ ⊔ G₂).edgeSet := by
rw [edgeSet_sup]
infer_instance
instance fintypeEdgeSetInf [DecidableEq V] [Fintype G₁.edgeSet] [Fintype G₂.edgeSet] :
Fintype (G₁ ⊓ G₂).edgeSet := by
rw [edgeSet_inf]
exact Set.fintypeInter _ _
instance fintypeEdgeSetSdiff [DecidableEq V] [Fintype G₁.edgeSet] [Fintype G₂.edgeSet] :
Fintype (G₁ \ G₂).edgeSet := by
rw [edgeSet_sdiff]
exact Set.fintypeDiff _ _
end EdgeSet
section FromEdgeSet
variable (s : Set (Sym2 V))
/-- `fromEdgeSet` constructs a `SimpleGraph` from a set of edges, without loops. -/
def fromEdgeSet : SimpleGraph V where
Adj := Sym2.ToRel s ⊓ Ne
symm _ _ h := ⟨Sym2.toRel_symmetric s h.1, h.2.symm⟩
@[simp]
theorem fromEdgeSet_adj : (fromEdgeSet s).Adj v w ↔ s(v, w) ∈ s ∧ v ≠ w :=
Iff.rfl
-- Note: we need to make sure `fromEdgeSet_adj` and this lemma are confluent.
-- In particular, both yield `s(u, v) ∈ (fromEdgeSet s).edgeSet` ==> `s(v, w) ∈ s ∧ v ≠ w`.
@[simp]
theorem edgeSet_fromEdgeSet : (fromEdgeSet s).edgeSet = s \ { e | e.IsDiag } := by
ext e
exact Sym2.ind (by simp) e
@[simp]
theorem fromEdgeSet_edgeSet : fromEdgeSet G.edgeSet = G := by
ext v w
exact ⟨fun h => h.1, fun h => ⟨h, G.ne_of_adj h⟩⟩
@[simp]
theorem fromEdgeSet_empty : fromEdgeSet (∅ : Set (Sym2 V)) = ⊥ := by
ext v w
simp only [fromEdgeSet_adj, Set.mem_empty_iff_false, false_and, bot_adj]
@[simp]
theorem fromEdgeSet_univ : fromEdgeSet (Set.univ : Set (Sym2 V)) = ⊤ := by
ext v w
simp only [fromEdgeSet_adj, Set.mem_univ, true_and, top_adj]
@[simp]
theorem fromEdgeSet_inter (s t : Set (Sym2 V)) :
fromEdgeSet (s ∩ t) = fromEdgeSet s ⊓ fromEdgeSet t := by
ext v w
simp only [fromEdgeSet_adj, Set.mem_inter_iff, Ne, inf_adj]
tauto
@[simp]
theorem fromEdgeSet_union (s t : Set (Sym2 V)) :
fromEdgeSet (s ∪ t) = fromEdgeSet s ⊔ fromEdgeSet t := by
ext v w
simp [Set.mem_union, or_and_right]
@[simp]
theorem fromEdgeSet_sdiff (s t : Set (Sym2 V)) :
fromEdgeSet (s \ t) = fromEdgeSet s \ fromEdgeSet t := by
ext v w
constructor <;> simp +contextual
@[gcongr, mono]
theorem fromEdgeSet_mono {s t : Set (Sym2 V)} (h : s ⊆ t) : fromEdgeSet s ≤ fromEdgeSet t := by
rintro v w
simp +contextual only [fromEdgeSet_adj, Ne, not_false_iff,
and_true, and_imp]
exact fun vws _ => h vws
@[simp] lemma disjoint_fromEdgeSet : Disjoint G (fromEdgeSet s) ↔ Disjoint G.edgeSet s := by
conv_rhs => rw [← Set.diff_union_inter s {e : Sym2 V | e.IsDiag}]
rw [← disjoint_edgeSet, edgeSet_fromEdgeSet, Set.disjoint_union_right, and_iff_left]
exact Set.disjoint_left.2 fun e he he' ↦ not_isDiag_of_mem_edgeSet _ he he'.2
@[simp] lemma fromEdgeSet_disjoint : Disjoint (fromEdgeSet s) G ↔ Disjoint s G.edgeSet := by
rw [disjoint_comm, disjoint_fromEdgeSet, disjoint_comm]
instance [DecidableEq V] [Fintype s] : Fintype (fromEdgeSet s).edgeSet := by
rw [edgeSet_fromEdgeSet s]
infer_instance
end FromEdgeSet
/-! ### Incidence set -/
/-- Set of edges incident to a given vertex, aka incidence set. -/
def incidenceSet (v : V) : Set (Sym2 V) :=
{ e ∈ G.edgeSet | v ∈ e }
theorem incidenceSet_subset (v : V) : G.incidenceSet v ⊆ G.edgeSet := fun _ h => h.1
theorem mk'_mem_incidenceSet_iff : s(b, c) ∈ G.incidenceSet a ↔ G.Adj b c ∧ (a = b ∨ a = c) :=
and_congr_right' Sym2.mem_iff
theorem mk'_mem_incidenceSet_left_iff : s(a, b) ∈ G.incidenceSet a ↔ G.Adj a b :=
and_iff_left <| Sym2.mem_mk_left _ _
theorem mk'_mem_incidenceSet_right_iff : s(a, b) ∈ G.incidenceSet b ↔ G.Adj a b :=
and_iff_left <| Sym2.mem_mk_right _ _
theorem edge_mem_incidenceSet_iff {e : G.edgeSet} : ↑e ∈ G.incidenceSet a ↔ a ∈ (e : Sym2 V) :=
and_iff_right e.2
theorem incidenceSet_inter_incidenceSet_subset (h : a ≠ b) :
G.incidenceSet a ∩ G.incidenceSet b ⊆ {s(a, b)} := fun _e he =>
(Sym2.mem_and_mem_iff h).1 ⟨he.1.2, he.2.2⟩
theorem incidenceSet_inter_incidenceSet_of_adj (h : G.Adj a b) :
G.incidenceSet a ∩ G.incidenceSet b = {s(a, b)} := by
refine (G.incidenceSet_inter_incidenceSet_subset <| h.ne).antisymm ?_
rintro _ (rfl : _ = s(a, b))
exact ⟨G.mk'_mem_incidenceSet_left_iff.2 h, G.mk'_mem_incidenceSet_right_iff.2 h⟩
theorem adj_of_mem_incidenceSet (h : a ≠ b) (ha : e ∈ G.incidenceSet a)
(hb : e ∈ G.incidenceSet b) : G.Adj a b := by
rwa [← mk'_mem_incidenceSet_left_iff, ←
Set.mem_singleton_iff.1 <| G.incidenceSet_inter_incidenceSet_subset h ⟨ha, hb⟩]
theorem incidenceSet_inter_incidenceSet_of_not_adj (h : ¬G.Adj a b) (hn : a ≠ b) :
G.incidenceSet a ∩ G.incidenceSet b = ∅ := by
simp_rw [Set.eq_empty_iff_forall_not_mem, Set.mem_inter_iff, not_and]
intro u ha hb
exact h (G.adj_of_mem_incidenceSet hn ha hb)
instance decidableMemIncidenceSet [DecidableEq V] [DecidableRel G.Adj] (v : V) :
DecidablePred (· ∈ G.incidenceSet v) :=
inferInstanceAs <| DecidablePred fun e => e ∈ G.edgeSet ∧ v ∈ e
@[simp]
| theorem mem_neighborSet (v w : V) : w ∈ G.neighborSet v ↔ G.Adj v w :=
Iff.rfl
lemma not_mem_neighborSet_self : a ∉ G.neighborSet a := by simp
| Mathlib/Combinatorics/SimpleGraph/Basic.lean | 677 | 680 |
/-
Copyright (c) 2019 Neil Strickland. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Neil Strickland
-/
import Mathlib.Algebra.BigOperators.Intervals
import Mathlib.Algebra.BigOperators.Ring.Finset
import Mathlib.Algebra.Group.NatPowAssoc
import Mathlib.Algebra.Order.BigOperators.Ring.Finset
import Mathlib.Algebra.Ring.Opposite
import Mathlib.Tactic.Abel
import Mathlib.Algebra.Ring.Regular
/-!
# Partial sums of geometric series
This file determines the values of the geometric series $\sum_{i=0}^{n-1} x^i$ and
$\sum_{i=0}^{n-1} x^i y^{n-1-i}$ and variants thereof. We also provide some bounds on the
"geometric" sum of `a/b^i` where `a b : ℕ`.
## Main statements
* `geom_sum_Ico` proves that $\sum_{i=m}^{n-1} x^i=\frac{x^n-x^m}{x-1}$ in a division ring.
* `geom_sum₂_Ico` proves that $\sum_{i=m}^{n-1} x^iy^{n - 1 - i}=\frac{x^n-y^{n-m}x^m}{x-y}$
in a field.
Several variants are recorded, generalising in particular to the case of a noncommutative ring in
which `x` and `y` commute. Even versions not using division or subtraction, valid in each semiring,
are recorded.
-/
variable {R K : Type*}
open Finset MulOpposite
section Semiring
variable [Semiring R]
theorem geom_sum_succ {x : R} {n : ℕ} :
∑ i ∈ range (n + 1), x ^ i = (x * ∑ i ∈ range n, x ^ i) + 1 := by
simp only [mul_sum, ← pow_succ', sum_range_succ', pow_zero]
theorem geom_sum_succ' {x : R} {n : ℕ} :
∑ i ∈ range (n + 1), x ^ i = x ^ n + ∑ i ∈ range n, x ^ i :=
(sum_range_succ _ _).trans (add_comm _ _)
theorem geom_sum_zero (x : R) : ∑ i ∈ range 0, x ^ i = 0 :=
rfl
theorem geom_sum_one (x : R) : ∑ i ∈ range 1, x ^ i = 1 := by simp [geom_sum_succ']
@[simp]
theorem geom_sum_two {x : R} : ∑ i ∈ range 2, x ^ i = x + 1 := by simp [geom_sum_succ']
@[simp]
theorem zero_geom_sum : ∀ {n}, ∑ i ∈ range n, (0 : R) ^ i = if n = 0 then 0 else 1
| 0 => by simp
| 1 => by simp
| n + 2 => by
rw [geom_sum_succ']
simp [zero_geom_sum]
theorem one_geom_sum (n : ℕ) : ∑ i ∈ range n, (1 : R) ^ i = n := by simp
theorem op_geom_sum (x : R) (n : ℕ) : op (∑ i ∈ range n, x ^ i) = ∑ i ∈ range n, op x ^ i := by
simp
@[simp]
theorem op_geom_sum₂ (x y : R) (n : ℕ) : ∑ i ∈ range n, op y ^ (n - 1 - i) * op x ^ i =
∑ i ∈ range n, op y ^ i * op x ^ (n - 1 - i) := by
rw [← sum_range_reflect]
refine sum_congr rfl fun j j_in => ?_
rw [mem_range, Nat.lt_iff_add_one_le] at j_in
congr
apply tsub_tsub_cancel_of_le
exact le_tsub_of_add_le_right j_in
theorem geom_sum₂_with_one (x : R) (n : ℕ) :
∑ i ∈ range n, x ^ i * 1 ^ (n - 1 - i) = ∑ i ∈ range n, x ^ i :=
sum_congr rfl fun i _ => by rw [one_pow, mul_one]
/-- $x^n-y^n = (x-y) \sum x^ky^{n-1-k}$ reformulated without `-` signs. -/
protected theorem Commute.geom_sum₂_mul_add {x y : R} (h : Commute x y) (n : ℕ) :
(∑ i ∈ range n, (x + y) ^ i * y ^ (n - 1 - i)) * x + y ^ n = (x + y) ^ n := by
let f : ℕ → ℕ → R := fun m i : ℕ => (x + y) ^ i * y ^ (m - 1 - i)
change (∑ i ∈ range n, (f n) i) * x + y ^ n = (x + y) ^ n
induction n with
| zero => rw [range_zero, sum_empty, zero_mul, zero_add, pow_zero, pow_zero]
| succ n ih =>
have f_last : f (n + 1) n = (x + y) ^ n := by
dsimp only [f]
rw [← tsub_add_eq_tsub_tsub, Nat.add_comm, tsub_self, pow_zero, mul_one]
have f_succ : ∀ i, i ∈ range n → f (n + 1) i = y * f n i := fun i hi => by
dsimp only [f]
have : Commute y ((x + y) ^ i) := (h.symm.add_right (Commute.refl y)).pow_right i
rw [← mul_assoc, this.eq, mul_assoc, ← pow_succ' y (n - 1 - i), add_tsub_cancel_right,
← tsub_add_eq_tsub_tsub, add_comm 1 i]
have : i + 1 + (n - (i + 1)) = n := add_tsub_cancel_of_le (mem_range.mp hi)
rw [add_comm (i + 1)] at this
rw [← this, add_tsub_cancel_right, add_comm i 1, ← add_assoc, add_tsub_cancel_right]
rw [pow_succ' (x + y), add_mul, sum_range_succ_comm, add_mul, f_last, add_assoc,
(((Commute.refl x).add_right h).pow_right n).eq, sum_congr rfl f_succ, ← mul_sum,
pow_succ' y, mul_assoc, ← mul_add y, ih]
end Semiring
@[simp]
theorem neg_one_geom_sum [Ring R] {n : ℕ} :
∑ i ∈ range n, (-1 : R) ^ i = if Even n then 0 else 1 := by
induction n with
| zero => simp
| succ k hk =>
simp only [geom_sum_succ', Nat.even_add_one, hk]
split_ifs with h
· rw [h.neg_one_pow, add_zero]
· rw [(Nat.not_even_iff_odd.1 h).neg_one_pow, neg_add_cancel]
theorem geom_sum₂_self {R : Type*} [Semiring R] (x : R) (n : ℕ) :
∑ i ∈ range n, x ^ i * x ^ (n - 1 - i) = n * x ^ (n - 1) :=
calc
∑ i ∈ Finset.range n, x ^ i * x ^ (n - 1 - i) =
∑ i ∈ Finset.range n, x ^ (i + (n - 1 - i)) := by
simp_rw [← pow_add]
_ = ∑ _i ∈ Finset.range n, x ^ (n - 1) :=
Finset.sum_congr rfl fun _ hi =>
congr_arg _ <| add_tsub_cancel_of_le <| Nat.le_sub_one_of_lt <| Finset.mem_range.1 hi
_ = #(range n) • x ^ (n - 1) := sum_const _
_ = n * x ^ (n - 1) := by rw [Finset.card_range, nsmul_eq_mul]
/-- $x^n-y^n = (x-y) \sum x^ky^{n-1-k}$ reformulated without `-` signs. -/
theorem geom_sum₂_mul_add [CommSemiring R] (x y : R) (n : ℕ) :
(∑ i ∈ range n, (x + y) ^ i * y ^ (n - 1 - i)) * x + y ^ n = (x + y) ^ n :=
(Commute.all x y).geom_sum₂_mul_add n
theorem geom_sum_mul_add [Semiring R] (x : R) (n : ℕ) :
(∑ i ∈ range n, (x + 1) ^ i) * x + 1 = (x + 1) ^ n := by
have := (Commute.one_right x).geom_sum₂_mul_add n
rw [one_pow, geom_sum₂_with_one] at this
exact this
protected theorem Commute.geom_sum₂_mul [Ring R] {x y : R} (h : Commute x y) (n : ℕ) :
(∑ i ∈ range n, x ^ i * y ^ (n - 1 - i)) * (x - y) = x ^ n - y ^ n := by
have := (h.sub_left (Commute.refl y)).geom_sum₂_mul_add n
rw [sub_add_cancel] at this
rw [← this, add_sub_cancel_right]
theorem Commute.mul_neg_geom_sum₂ [Ring R] {x y : R} (h : Commute x y) (n : ℕ) :
((y - x) * ∑ i ∈ range n, x ^ i * y ^ (n - 1 - i)) = y ^ n - x ^ n := by
apply op_injective
simp only [op_mul, op_sub, op_geom_sum₂, op_pow]
simp [(Commute.op h.symm).geom_sum₂_mul n]
theorem Commute.mul_geom_sum₂ [Ring R] {x y : R} (h : Commute x y) (n : ℕ) :
((x - y) * ∑ i ∈ range n, x ^ i * y ^ (n - 1 - i)) = x ^ n - y ^ n := by
rw [← neg_sub (y ^ n), ← h.mul_neg_geom_sum₂, ← neg_mul, neg_sub]
theorem geom_sum₂_mul [CommRing R] (x y : R) (n : ℕ) :
(∑ i ∈ range n, x ^ i * y ^ (n - 1 - i)) * (x - y) = x ^ n - y ^ n :=
(Commute.all x y).geom_sum₂_mul n
theorem geom_sum₂_mul_of_ge [CommSemiring R] [PartialOrder R] [AddLeftReflectLE R] [AddLeftMono R]
[ExistsAddOfLE R] [Sub R] [OrderedSub R] {x y : R} (hxy : y ≤ x) (n : ℕ) :
(∑ i ∈ range n, x ^ i * y ^ (n - 1 - i)) * (x - y) = x ^ n - y ^ n := by
apply eq_tsub_of_add_eq
simpa only [tsub_add_cancel_of_le hxy] using geom_sum₂_mul_add (x - y) y n
theorem geom_sum₂_mul_of_le [CommSemiring R] [PartialOrder R] [AddLeftReflectLE R] [AddLeftMono R]
[ExistsAddOfLE R] [Sub R] [OrderedSub R] {x y : R} (hxy : x ≤ y) (n : ℕ) :
(∑ i ∈ range n, x ^ i * y ^ (n - 1 - i)) * (y - x) = y ^ n - x ^ n := by
rw [← Finset.sum_range_reflect]
convert geom_sum₂_mul_of_ge hxy n using 3
simp_all only [Finset.mem_range]
rw [mul_comm]
congr
omega
theorem Commute.sub_dvd_pow_sub_pow [Ring R] {x y : R} (h : Commute x y) (n : ℕ) :
x - y ∣ x ^ n - y ^ n :=
Dvd.intro _ <| h.mul_geom_sum₂ _
theorem sub_dvd_pow_sub_pow [CommRing R] (x y : R) (n : ℕ) : x - y ∣ x ^ n - y ^ n :=
(Commute.all x y).sub_dvd_pow_sub_pow n
theorem nat_sub_dvd_pow_sub_pow (x y n : ℕ) : x - y ∣ x ^ n - y ^ n := by
rcases le_or_lt y x with h | h
· have : y ^ n ≤ x ^ n := Nat.pow_le_pow_left h _
exact mod_cast sub_dvd_pow_sub_pow (x : ℤ) (↑y) n
· have : x ^ n ≤ y ^ n := Nat.pow_le_pow_left h.le _
exact (Nat.sub_eq_zero_of_le this).symm ▸ dvd_zero (x - y)
theorem one_sub_dvd_one_sub_pow [Ring R] (x : R) (n : ℕ) :
1 - x ∣ 1 - x ^ n := by
conv_rhs => rw [← one_pow n]
exact (Commute.one_left x).sub_dvd_pow_sub_pow n
theorem sub_one_dvd_pow_sub_one [Ring R] (x : R) (n : ℕ) :
x - 1 ∣ x ^ n - 1 := by
conv_rhs => rw [← one_pow n]
exact (Commute.one_right x).sub_dvd_pow_sub_pow n
lemma pow_one_sub_dvd_pow_mul_sub_one [Ring R] (x : R) (m n : ℕ) :
((x ^ m) - 1 : R) ∣ (x ^ (m * n) - 1) := by
rw [npow_mul]
exact sub_one_dvd_pow_sub_one (x := x ^ m) (n := n)
lemma nat_pow_one_sub_dvd_pow_mul_sub_one (x m n : ℕ) : x ^ m - 1 ∣ x ^ (m * n) - 1 := by
nth_rw 2 [← Nat.one_pow n]
rw [Nat.pow_mul x m n]
apply nat_sub_dvd_pow_sub_pow (x ^ m) 1
theorem Odd.add_dvd_pow_add_pow [CommRing R] (x y : R) {n : ℕ} (h : Odd n) :
x + y ∣ x ^ n + y ^ n := by
have h₁ := geom_sum₂_mul x (-y) n
rw [Odd.neg_pow h y, sub_neg_eq_add, sub_neg_eq_add] at h₁
exact Dvd.intro_left _ h₁
theorem Odd.nat_add_dvd_pow_add_pow (x y : ℕ) {n : ℕ} (h : Odd n) : x + y ∣ x ^ n + y ^ n :=
mod_cast Odd.add_dvd_pow_add_pow (x : ℤ) (↑y) h
theorem geom_sum_mul [Ring R] (x : R) (n : ℕ) : (∑ i ∈ range n, x ^ i) * (x - 1) = x ^ n - 1 := by
have := (Commute.one_right x).geom_sum₂_mul n
rw [one_pow, geom_sum₂_with_one] at this
exact this
theorem geom_sum_mul_of_one_le [CommSemiring R] [PartialOrder R] [AddLeftReflectLE R]
[AddLeftMono R] [ExistsAddOfLE R] [Sub R] [OrderedSub R] {x : R} (hx : 1 ≤ x) (n : ℕ) :
(∑ i ∈ range n, x ^ i) * (x - 1) = x ^ n - 1 := by
simpa using geom_sum₂_mul_of_ge hx n
theorem geom_sum_mul_of_le_one [CommSemiring R] [PartialOrder R] [AddLeftReflectLE R]
[AddLeftMono R] [ExistsAddOfLE R] [Sub R] [OrderedSub R] {x : R} (hx : x ≤ 1) (n : ℕ) :
(∑ i ∈ range n, x ^ i) * (1 - x) = 1 - x ^ n := by
simpa using geom_sum₂_mul_of_le hx n
theorem mul_geom_sum [Ring R] (x : R) (n : ℕ) : ((x - 1) * ∑ i ∈ range n, x ^ i) = x ^ n - 1 :=
op_injective <| by simpa using geom_sum_mul (op x) n
theorem geom_sum_mul_neg [Ring R] (x : R) (n : ℕ) :
(∑ i ∈ range n, x ^ i) * (1 - x) = 1 - x ^ n := by
have := congr_arg Neg.neg (geom_sum_mul x n)
rw [neg_sub, ← mul_neg, neg_sub] at this
exact this
theorem mul_neg_geom_sum [Ring R] (x : R) (n : ℕ) : ((1 - x) * ∑ i ∈ range n, x ^ i) = 1 - x ^ n :=
op_injective <| by simpa using geom_sum_mul_neg (op x) n
protected theorem Commute.geom_sum₂_comm [Semiring R] {x y : R} (n : ℕ)
(h : Commute x y) :
∑ i ∈ range n, x ^ i * y ^ (n - 1 - i) = ∑ i ∈ range n, y ^ i * x ^ (n - 1 - i) := by
cases n; · simp
simp only [Nat.succ_eq_add_one, Nat.add_sub_cancel]
rw [← Finset.sum_flip]
refine Finset.sum_congr rfl fun i hi => ?_
simpa [Nat.sub_sub_self (Nat.succ_le_succ_iff.mp (Finset.mem_range.mp hi))] using h.pow_pow _ _
theorem geom_sum₂_comm [CommSemiring R] (x y : R) (n : ℕ) :
∑ i ∈ range n, x ^ i * y ^ (n - 1 - i) = ∑ i ∈ range n, y ^ i * x ^ (n - 1 - i) :=
(Commute.all x y).geom_sum₂_comm n
protected theorem Commute.geom_sum₂ [DivisionRing K] {x y : K} (h' : Commute x y) (h : x ≠ y)
(n : ℕ) : ∑ i ∈ range n, x ^ i * y ^ (n - 1 - i) = (x ^ n - y ^ n) / (x - y) := by
have : x - y ≠ 0 := by simp_all [sub_eq_iff_eq_add]
rw [← h'.geom_sum₂_mul, mul_div_cancel_right₀ _ this]
theorem geom₂_sum [Field K] {x y : K} (h : x ≠ y) (n : ℕ) :
∑ i ∈ range n, x ^ i * y ^ (n - 1 - i) = (x ^ n - y ^ n) / (x - y) :=
(Commute.all x y).geom_sum₂ h n
theorem geom₂_sum_of_gt [Semifield K] [LinearOrder K] [IsStrictOrderedRing K]
[CanonicallyOrderedAdd K] [Sub K] [OrderedSub K]
{x y : K} (h : y < x) (n : ℕ) :
∑ i ∈ range n, x ^ i * y ^ (n - 1 - i) = (x ^ n - y ^ n) / (x - y) :=
eq_div_of_mul_eq (tsub_pos_of_lt h).ne' (geom_sum₂_mul_of_ge h.le n)
theorem geom₂_sum_of_lt [Semifield K] [LinearOrder K] [IsStrictOrderedRing K]
[CanonicallyOrderedAdd K] [Sub K] [OrderedSub K]
{x y : K} (h : x < y) (n : ℕ) :
∑ i ∈ range n, x ^ i * y ^ (n - 1 - i) = (y ^ n - x ^ n) / (y - x) :=
eq_div_of_mul_eq (tsub_pos_of_lt h).ne' (geom_sum₂_mul_of_le h.le n)
theorem geom_sum_eq [DivisionRing K] {x : K} (h : x ≠ 1) (n : ℕ) :
∑ i ∈ range n, x ^ i = (x ^ n - 1) / (x - 1) := by
have : x - 1 ≠ 0 := by simp_all [sub_eq_iff_eq_add]
rw [← geom_sum_mul, mul_div_cancel_right₀ _ this]
lemma geom_sum_of_one_lt {x : K} [Semifield K] [LinearOrder K] [IsStrictOrderedRing K]
[CanonicallyOrderedAdd K] [Sub K] [OrderedSub K]
(h : 1 < x) (n : ℕ) :
∑ i ∈ Finset.range n, x ^ i = (x ^ n - 1) / (x - 1) :=
eq_div_of_mul_eq (tsub_pos_of_lt h).ne' (geom_sum_mul_of_one_le h.le n)
lemma geom_sum_of_lt_one {x : K} [Semifield K] [LinearOrder K] [IsStrictOrderedRing K]
[CanonicallyOrderedAdd K] [Sub K] [OrderedSub K]
(h : x < 1) (n : ℕ) :
∑ i ∈ Finset.range n, x ^ i = (1 - x ^ n) / (1 - x) :=
eq_div_of_mul_eq (tsub_pos_of_lt h).ne' (geom_sum_mul_of_le_one h.le n)
theorem geom_sum_lt {x : K} [Semifield K] [LinearOrder K] [IsStrictOrderedRing K]
[CanonicallyOrderedAdd K] [Sub K] [OrderedSub K]
(h0 : x ≠ 0) (h1 : x < 1) (n : ℕ) : ∑ i ∈ range n, x ^ i < (1 - x)⁻¹ := by
rw [← pos_iff_ne_zero] at h0
rw [geom_sum_of_lt_one h1, div_lt_iff₀, inv_mul_cancel₀, tsub_lt_self_iff]
· exact ⟨h0.trans h1, pow_pos h0 n⟩
· rwa [ne_eq, tsub_eq_zero_iff_le, not_le]
· rwa [tsub_pos_iff_lt]
protected theorem Commute.mul_geom_sum₂_Ico [Ring R] {x y : R} (h : Commute x y) {m n : ℕ}
(hmn : m ≤ n) :
((x - y) * ∑ i ∈ Finset.Ico m n, x ^ i * y ^ (n - 1 - i)) = x ^ n - x ^ m * y ^ (n - m) := by
rw [sum_Ico_eq_sub _ hmn]
have :
∑ k ∈ range m, x ^ k * y ^ (n - 1 - k) =
∑ k ∈ range m, x ^ k * (y ^ (n - m) * y ^ (m - 1 - k)) := by
refine sum_congr rfl fun j j_in => ?_
rw [← pow_add]
congr
rw [mem_range] at j_in
omega
rw [this]
simp_rw [pow_mul_comm y (n - m) _]
simp_rw [← mul_assoc]
rw [← sum_mul, mul_sub, h.mul_geom_sum₂, ← mul_assoc, h.mul_geom_sum₂, sub_mul, ← pow_add,
add_tsub_cancel_of_le hmn, sub_sub_sub_cancel_right (x ^ n) (x ^ m * y ^ (n - m)) (y ^ n)]
protected theorem Commute.geom_sum₂_succ_eq [Ring R] {x y : R} (h : Commute x y) {n : ℕ} :
∑ i ∈ range (n + 1), x ^ i * y ^ (n - i) =
x ^ n + y * ∑ i ∈ range n, x ^ i * y ^ (n - 1 - i) := by
simp_rw [mul_sum, sum_range_succ_comm, tsub_self, pow_zero, mul_one, add_right_inj, ← mul_assoc,
(h.symm.pow_right _).eq, mul_assoc, ← pow_succ']
refine sum_congr rfl fun i hi => ?_
suffices n - 1 - i + 1 = n - i by rw [this]
rw [Finset.mem_range] at hi
omega
theorem geom_sum₂_succ_eq [CommRing R] (x y : R) {n : ℕ} :
∑ i ∈ range (n + 1), x ^ i * y ^ (n - i) =
x ^ n + y * ∑ i ∈ range n, x ^ i * y ^ (n - 1 - i) :=
(Commute.all x y).geom_sum₂_succ_eq
theorem mul_geom_sum₂_Ico [CommRing R] (x y : R) {m n : ℕ} (hmn : m ≤ n) :
((x - y) * ∑ i ∈ Finset.Ico m n, x ^ i * y ^ (n - 1 - i)) = x ^ n - x ^ m * y ^ (n - m) :=
(Commute.all x y).mul_geom_sum₂_Ico hmn
protected theorem Commute.geom_sum₂_Ico_mul [Ring R] {x y : R} (h : Commute x y) {m n : ℕ}
(hmn : m ≤ n) :
(∑ i ∈ Finset.Ico m n, x ^ i * y ^ (n - 1 - i)) * (x - y) = x ^ n - y ^ (n - m) * x ^ m := by
apply op_injective
simp only [op_sub, op_mul, op_pow, op_sum]
have : (∑ k ∈ Ico m n, MulOpposite.op y ^ (n - 1 - k) * MulOpposite.op x ^ k) =
∑ k ∈ Ico m n, MulOpposite.op x ^ k * MulOpposite.op y ^ (n - 1 - k) := by
refine sum_congr rfl fun k _ => ?_
have hp := Commute.pow_pow (Commute.op h.symm) (n - 1 - k) k
simpa [Commute, SemiconjBy] using hp
simp only [this]
convert (Commute.op h).mul_geom_sum₂_Ico hmn
theorem geom_sum_Ico_mul [Ring R] (x : R) {m n : ℕ} (hmn : m ≤ n) :
(∑ i ∈ Finset.Ico m n, x ^ i) * (x - 1) = x ^ n - x ^ m := by
rw [sum_Ico_eq_sub _ hmn, sub_mul, geom_sum_mul, geom_sum_mul, sub_sub_sub_cancel_right]
theorem geom_sum_Ico_mul_neg [Ring R] (x : R) {m n : ℕ} (hmn : m ≤ n) :
(∑ i ∈ Finset.Ico m n, x ^ i) * (1 - x) = x ^ m - x ^ n := by
rw [sum_Ico_eq_sub _ hmn, sub_mul, geom_sum_mul_neg, geom_sum_mul_neg, sub_sub_sub_cancel_left]
protected theorem Commute.geom_sum₂_Ico [DivisionRing K] {x y : K} (h : Commute x y) (hxy : x ≠ y)
{m n : ℕ} (hmn : m ≤ n) :
(∑ i ∈ Finset.Ico m n, x ^ i * y ^ (n - 1 - i)) = (x ^ n - y ^ (n - m) * x ^ m) / (x - y) := by
have : x - y ≠ 0 := by simp_all [sub_eq_iff_eq_add]
rw [← h.geom_sum₂_Ico_mul hmn, mul_div_cancel_right₀ _ this]
theorem geom_sum₂_Ico [Field K] {x y : K} (hxy : x ≠ y) {m n : ℕ} (hmn : m ≤ n) :
(∑ i ∈ Finset.Ico m n, x ^ i * y ^ (n - 1 - i)) = (x ^ n - y ^ (n - m) * x ^ m) / (x - y) :=
(Commute.all x y).geom_sum₂_Ico hxy hmn
theorem geom_sum_Ico [DivisionRing K] {x : K} (hx : x ≠ 1) {m n : ℕ} (hmn : m ≤ n) :
∑ i ∈ Finset.Ico m n, x ^ i = (x ^ n - x ^ m) / (x - 1) := by
simp only [sum_Ico_eq_sub _ hmn, geom_sum_eq hx, div_sub_div_same, sub_sub_sub_cancel_right]
theorem geom_sum_Ico' [DivisionRing K] {x : K} (hx : x ≠ 1) {m n : ℕ} (hmn : m ≤ n) :
∑ i ∈ Finset.Ico m n, x ^ i = (x ^ m - x ^ n) / (1 - x) := by
simp only [geom_sum_Ico hx hmn]
convert neg_div_neg_eq (x ^ m - x ^ n) (1 - x) using 2 <;> abel
theorem geom_sum_Ico_le_of_lt_one [Field K] [LinearOrder K] [IsStrictOrderedRing K]
{x : K} (hx : 0 ≤ x) (h'x : x < 1)
{m n : ℕ} : ∑ i ∈ Ico m n, x ^ i ≤ x ^ m / (1 - x) := by
rcases le_or_lt m n with (hmn | hmn)
· rw [geom_sum_Ico' h'x.ne hmn]
apply div_le_div₀ (pow_nonneg hx _) _ (sub_pos.2 h'x) le_rfl
simpa using pow_nonneg hx _
· rw [Ico_eq_empty, sum_empty]
· apply div_nonneg (pow_nonneg hx _)
simpa using h'x.le
· simpa using hmn.le
theorem geom_sum_inv [DivisionRing K] {x : K} (hx1 : x ≠ 1) (hx0 : x ≠ 0) (n : ℕ) :
∑ i ∈ range n, x⁻¹ ^ i = (x - 1)⁻¹ * (x - x⁻¹ ^ n * x) := by
have h₁ : x⁻¹ ≠ 1 := by rwa [inv_eq_one_div, Ne, div_eq_iff_mul_eq hx0, one_mul]
have h₂ : x⁻¹ - 1 ≠ 0 := mt sub_eq_zero.1 h₁
have h₃ : x - 1 ≠ 0 := mt sub_eq_zero.1 hx1
have h₄ : x * (x ^ n)⁻¹ = (x ^ n)⁻¹ * x :=
Nat.recOn n (by simp) fun n h => by
rw [pow_succ', mul_inv_rev, ← mul_assoc, h, mul_assoc, mul_inv_cancel₀ hx0, mul_assoc,
inv_mul_cancel₀ hx0]
rw [geom_sum_eq h₁, div_eq_iff_mul_eq h₂, ← mul_right_inj' h₃, ← mul_assoc, ← mul_assoc,
mul_inv_cancel₀ h₃]
simp [mul_add, add_mul, mul_inv_cancel₀ hx0, mul_assoc, h₄, sub_eq_add_neg, add_comm,
add_left_comm]
rw [add_comm _ (-x), add_assoc, add_assoc _ _ 1]
variable {S : Type*}
-- TODO: for consistency, the next two lemmas should be moved to the root namespace
theorem RingHom.map_geom_sum [Semiring R] [Semiring S] (x : R) (n : ℕ) (f : R →+* S) :
f (∑ i ∈ range n, x ^ i) = ∑ i ∈ range n, f x ^ i := by simp [map_sum f]
theorem RingHom.map_geom_sum₂ [Semiring R] [Semiring S] (x y : R) (n : ℕ) (f : R →+* S) :
f (∑ i ∈ range n, x ^ i * y ^ (n - 1 - i)) = ∑ i ∈ range n, f x ^ i * f y ^ (n - 1 - i) := by
simp [map_sum f]
/-! ### Geometric sum with `ℕ`-division -/
theorem Nat.pred_mul_geom_sum_le (a b n : ℕ) :
((b - 1) * ∑ i ∈ range n.succ, a / b ^ i) ≤ a * b - a / b ^ n :=
calc
((b - 1) * ∑ i ∈ range n.succ, a / b ^ i) =
(∑ i ∈ range n, a / b ^ (i + 1) * b) + a * b - ((∑ i ∈ range n, a / b ^ i) + a / b ^ n) := by
rw [tsub_mul, mul_comm, sum_mul, one_mul, sum_range_succ', sum_range_succ, pow_zero,
Nat.div_one]
_ ≤ (∑ i ∈ range n, a / b ^ i) + a * b - ((∑ i ∈ range n, a / b ^ i) + a / b ^ n) := by
gcongr with i hi
rw [pow_succ, ← Nat.div_div_eq_div_mul]
exact Nat.div_mul_le_self _ _
_ = a * b - a / b ^ n := add_tsub_add_eq_tsub_left _ _ _
theorem Nat.geom_sum_le {b : ℕ} (hb : 2 ≤ b) (a n : ℕ) :
∑ i ∈ range n, a / b ^ i ≤ a * b / (b - 1) := by
refine (Nat.le_div_iff_mul_le <| tsub_pos_of_lt hb).2 ?_
rcases n with - | n
· rw [sum_range_zero, zero_mul]
exact Nat.zero_le _
rw [mul_comm]
exact (Nat.pred_mul_geom_sum_le a b n).trans tsub_le_self
theorem Nat.geom_sum_Ico_le {b : ℕ} (hb : 2 ≤ b) (a n : ℕ) :
∑ i ∈ Ico 1 n, a / b ^ i ≤ a / (b - 1) := by
rcases n with - | n
· rw [Ico_eq_empty_of_le (zero_le_one' ℕ), sum_empty]
exact Nat.zero_le _
rw [← add_le_add_iff_left a]
calc
(a + ∑ i ∈ Ico 1 n.succ, a / b ^ i) = a / b ^ 0 + ∑ i ∈ Ico 1 n.succ, a / b ^ i := by
rw [pow_zero, Nat.div_one]
_ = ∑ i ∈ range n.succ, a / b ^ i := by
rw [range_eq_Ico, ← Nat.Ico_insert_succ_left (Nat.succ_pos _), sum_insert]
exact fun h => zero_lt_one.not_le (mem_Ico.1 h).1
_ ≤ a * b / (b - 1) := Nat.geom_sum_le hb a _
_ = (a * 1 + a * (b - 1)) / (b - 1) := by
rw [← mul_add, add_tsub_cancel_of_le (one_le_two.trans hb)]
_ = a + a / (b - 1) := by rw [mul_one, Nat.add_mul_div_right _ _ (tsub_pos_of_lt hb), add_comm]
section Order
variable {n : ℕ} {x : R}
theorem geom_sum_pos [Semiring R] [PartialOrder R] [IsStrictOrderedRing R]
(hx : 0 ≤ x) (hn : n ≠ 0) :
0 < ∑ i ∈ range n, x ^ i :=
sum_pos' (fun _ _ => pow_nonneg hx _) ⟨0, mem_range.2 hn.bot_lt, by simp⟩
theorem geom_sum_pos_and_lt_one [Ring R] [PartialOrder R] [IsStrictOrderedRing R]
(hx : x < 0) (hx' : 0 < x + 1) (hn : 1 < n) :
(0 < ∑ i ∈ range n, x ^ i) ∧ ∑ i ∈ range n, x ^ i < 1 := by
refine Nat.le_induction ?_ ?_ n (show 2 ≤ n from hn)
· rw [geom_sum_two]
exact ⟨hx', (add_lt_iff_neg_right _).2 hx⟩
clear hn
intro n _ ihn
rw [geom_sum_succ, add_lt_iff_neg_right, ← neg_lt_iff_pos_add', neg_mul_eq_neg_mul]
exact
⟨mul_lt_one_of_nonneg_of_lt_one_left (neg_nonneg.2 hx.le) (neg_lt_iff_pos_add'.2 hx') ihn.2.le,
mul_neg_of_neg_of_pos hx ihn.1⟩
theorem geom_sum_alternating_of_le_neg_one [Ring R] [PartialOrder R] [IsOrderedRing R]
(hx : x + 1 ≤ 0) (n : ℕ) :
if Even n then (∑ i ∈ range n, x ^ i) ≤ 0 else 1 ≤ ∑ i ∈ range n, x ^ i := by
have hx0 : x ≤ 0 := (le_add_of_nonneg_right zero_le_one).trans hx
induction n with
| zero => simp only [range_zero, sum_empty, le_refl, ite_true, Even.zero]
| succ n ih =>
simp only [Nat.even_add_one, geom_sum_succ]
split_ifs at ih with h
· rw [if_neg (not_not_intro h), le_add_iff_nonneg_left]
exact mul_nonneg_of_nonpos_of_nonpos hx0 ih
· rw [if_pos h]
refine (add_le_add_right ?_ _).trans hx
simpa only [mul_one] using mul_le_mul_of_nonpos_left ih hx0
theorem geom_sum_alternating_of_lt_neg_one [Ring R] [PartialOrder R] [IsStrictOrderedRing R]
(hx : x + 1 < 0) (hn : 1 < n) :
if Even n then (∑ i ∈ range n, x ^ i) < 0 else 1 < ∑ i ∈ range n, x ^ i := by
have hx0 : x < 0 := (le_add_of_nonneg_right zero_le_one).trans_lt hx
refine Nat.le_induction ?_ ?_ n (show 2 ≤ n from hn)
· simp only [geom_sum_two, lt_add_iff_pos_left, ite_true, gt_iff_lt, hx, even_two]
clear hn
intro n _ ihn
simp only [Nat.even_add_one, geom_sum_succ]
by_cases hn' : Even n
· rw [if_pos hn'] at ihn
rw [if_neg, lt_add_iff_pos_left]
· exact mul_pos_of_neg_of_neg hx0 ihn
· exact not_not_intro hn'
· rw [if_neg hn'] at ihn
rw [if_pos]
swap
· exact hn'
have := add_lt_add_right (mul_lt_mul_of_neg_left ihn hx0) 1
rw [mul_one] at this
exact this.trans hx
theorem geom_sum_pos' [Ring R] [LinearOrder R] [IsStrictOrderedRing R]
(hx : 0 < x + 1) (hn : n ≠ 0) :
0 < ∑ i ∈ range n, x ^ i := by
obtain _ | _ | n := n
· cases hn rfl
· simp only [zero_add, range_one, sum_singleton, pow_zero, zero_lt_one]
obtain hx' | hx' := lt_or_le x 0
· exact (geom_sum_pos_and_lt_one hx' hx n.one_lt_succ_succ).1
· exact geom_sum_pos hx' (by simp only [Nat.succ_ne_zero, Ne, not_false_iff])
theorem Odd.geom_sum_pos [Ring R] [LinearOrder R] [IsStrictOrderedRing R]
(h : Odd n) : 0 < ∑ i ∈ range n, x ^ i := by
rcases n with (_ | _ | k)
· exact (Nat.not_odd_zero h).elim
· simp only [zero_add, range_one, sum_singleton, pow_zero, zero_lt_one]
rw [← Nat.not_even_iff_odd] at h
rcases lt_trichotomy (x + 1) 0 with (hx | hx | hx)
· have := geom_sum_alternating_of_lt_neg_one hx k.one_lt_succ_succ
simp only [h, if_false] at this
exact zero_lt_one.trans this
· simp only [eq_neg_of_add_eq_zero_left hx, h, neg_one_geom_sum, if_false, zero_lt_one]
· exact geom_sum_pos' hx k.succ.succ_ne_zero
theorem geom_sum_pos_iff [Ring R] [LinearOrder R] [IsStrictOrderedRing R] (hn : n ≠ 0) :
(0 < ∑ i ∈ range n, x ^ i) ↔ Odd n ∨ 0 < x + 1 := by
refine ⟨fun h => ?_, ?_⟩
· rw [or_iff_not_imp_left, ← not_le, Nat.not_odd_iff_even]
refine fun hn hx => h.not_le ?_
simpa [if_pos hn] using geom_sum_alternating_of_le_neg_one hx n
· rintro (hn | hx')
· exact hn.geom_sum_pos
· exact geom_sum_pos' hx' hn
theorem geom_sum_ne_zero [Ring R] [LinearOrder R] [IsStrictOrderedRing R]
(hx : x ≠ -1) (hn : n ≠ 0) :
∑ i ∈ range n, x ^ i ≠ 0 := by
obtain _ | _ | n := n
· cases hn rfl
· simp only [zero_add, range_one, sum_singleton, pow_zero, ne_eq, one_ne_zero, not_false_eq_true]
rw [Ne, eq_neg_iff_add_eq_zero, ← Ne] at hx
obtain h | h := hx.lt_or_lt
· have := geom_sum_alternating_of_lt_neg_one h n.one_lt_succ_succ
split_ifs at this
· exact this.ne
· exact (zero_lt_one.trans this).ne'
· exact (geom_sum_pos' h n.succ.succ_ne_zero).ne'
theorem geom_sum_eq_zero_iff_neg_one [Ring R] [LinearOrder R] [IsStrictOrderedRing R] (hn : n ≠ 0) :
∑ i ∈ range n, x ^ i = 0 ↔ x = -1 ∧ Even n := by
refine ⟨fun h => ?_, @fun ⟨h, hn⟩ => by simp only [h, hn, neg_one_geom_sum, if_true]⟩
contrapose! h
have hx := eq_or_ne x (-1)
rcases hx with hx | hx
· rw [hx, neg_one_geom_sum]
simp only [h hx, ite_false, ne_eq, one_ne_zero, not_false_eq_true]
· exact geom_sum_ne_zero hx hn
theorem geom_sum_neg_iff [Ring R] [LinearOrder R] [IsStrictOrderedRing R] (hn : n ≠ 0) :
∑ i ∈ range n, x ^ i < 0 ↔ Even n ∧ x + 1 < 0 := by
rw [← not_iff_not, not_lt, le_iff_lt_or_eq, eq_comm,
or_congr (geom_sum_pos_iff hn) (geom_sum_eq_zero_iff_neg_one hn), ← Nat.not_even_iff_odd, ←
add_eq_zero_iff_eq_neg, not_and, not_lt, le_iff_lt_or_eq, eq_comm, ← imp_iff_not_or, or_comm,
and_comm, Decidable.and_or_imp, or_comm]
end Order
variable {m n : ℕ} {s : Finset ℕ}
| /-- Value of a geometric sum over the naturals. Note: see `geom_sum_mul_add` for a formulation
that avoids division and subtraction. -/
lemma Nat.geomSum_eq (hm : 2 ≤ m) (n : ℕ) :
∑ k ∈ range n, m ^ k = (m ^ n - 1) / (m - 1) := by
refine (Nat.div_eq_of_eq_mul_left (tsub_pos_iff_lt.2 hm) <| tsub_eq_of_eq_add ?_).symm
simpa only [tsub_add_cancel_of_le (one_le_two.trans hm), eq_comm] using geom_sum_mul_add (m - 1) n
| Mathlib/Algebra/GeomSum.lean | 591 | 596 |
/-
Copyright (c) 2020 Aaron Anderson. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Aaron Anderson
-/
import Mathlib.Algebra.BigOperators.Ring.Finset
import Mathlib.Algebra.Module.BigOperators
import Mathlib.NumberTheory.Divisors
import Mathlib.Data.Nat.Squarefree
import Mathlib.Data.Nat.GCD.BigOperators
import Mathlib.Data.Nat.Factorization.Induction
import Mathlib.Tactic.ArithMult
/-!
# Arithmetic Functions and Dirichlet Convolution
This file defines arithmetic functions, which are functions from `ℕ` to a specified type that map 0
to 0. In the literature, they are often instead defined as functions from `ℕ+`. These arithmetic
functions are endowed with a multiplication, given by Dirichlet convolution, and pointwise addition,
to form the Dirichlet ring.
## Main Definitions
* `ArithmeticFunction R` consists of functions `f : ℕ → R` such that `f 0 = 0`.
* An arithmetic function `f` `IsMultiplicative` when `x.Coprime y → f (x * y) = f x * f y`.
* The pointwise operations `pmul` and `ppow` differ from the multiplication
and power instances on `ArithmeticFunction R`, which use Dirichlet multiplication.
* `ζ` is the arithmetic function such that `ζ x = 1` for `0 < x`.
* `σ k` is the arithmetic function such that `σ k x = ∑ y ∈ divisors x, y ^ k` for `0 < x`.
* `pow k` is the arithmetic function such that `pow k x = x ^ k` for `0 < x`.
* `id` is the identity arithmetic function on `ℕ`.
* `ω n` is the number of distinct prime factors of `n`.
* `Ω n` is the number of prime factors of `n` counted with multiplicity.
* `μ` is the Möbius function (spelled `moebius` in code).
## Main Results
* Several forms of Möbius inversion:
* `sum_eq_iff_sum_mul_moebius_eq` for functions to a `CommRing`
* `sum_eq_iff_sum_smul_moebius_eq` for functions to an `AddCommGroup`
* `prod_eq_iff_prod_pow_moebius_eq` for functions to a `CommGroup`
* `prod_eq_iff_prod_pow_moebius_eq_of_nonzero` for functions to a `CommGroupWithZero`
* And variants that apply when the equalities only hold on a set `S : Set ℕ` such that
`m ∣ n → n ∈ S → m ∈ S`:
* `sum_eq_iff_sum_mul_moebius_eq_on` for functions to a `CommRing`
* `sum_eq_iff_sum_smul_moebius_eq_on` for functions to an `AddCommGroup`
* `prod_eq_iff_prod_pow_moebius_eq_on` for functions to a `CommGroup`
* `prod_eq_iff_prod_pow_moebius_eq_on_of_nonzero` for functions to a `CommGroupWithZero`
## Notation
All notation is localized in the namespace `ArithmeticFunction`.
The arithmetic functions `ζ`, `σ`, `ω`, `Ω` and `μ` have Greek letter names.
In addition, there are separate locales `ArithmeticFunction.zeta` for `ζ`,
`ArithmeticFunction.sigma` for `σ`, `ArithmeticFunction.omega` for `ω`,
`ArithmeticFunction.Omega` for `Ω`, and `ArithmeticFunction.Moebius` for `μ`,
to allow for selective access to these notations.
The arithmetic function $$n \mapsto \prod_{p \mid n} f(p)$$ is given custom notation
`∏ᵖ p ∣ n, f p` when applied to `n`.
## Tags
arithmetic functions, dirichlet convolution, divisors
-/
open Finset
open Nat
variable (R : Type*)
/-- An arithmetic function is a function from `ℕ` that maps 0 to 0. In the literature, they are
often instead defined as functions from `ℕ+`. Multiplication on `ArithmeticFunctions` is by
Dirichlet convolution. -/
def ArithmeticFunction [Zero R] :=
ZeroHom ℕ R
instance ArithmeticFunction.zero [Zero R] : Zero (ArithmeticFunction R) :=
inferInstanceAs (Zero (ZeroHom ℕ R))
instance [Zero R] : Inhabited (ArithmeticFunction R) := inferInstanceAs (Inhabited (ZeroHom ℕ R))
variable {R}
namespace ArithmeticFunction
section Zero
variable [Zero R]
instance : FunLike (ArithmeticFunction R) ℕ R :=
inferInstanceAs (FunLike (ZeroHom ℕ R) ℕ R)
@[simp]
theorem toFun_eq (f : ArithmeticFunction R) : f.toFun = f := rfl
@[simp]
theorem coe_mk (f : ℕ → R) (hf) : @DFunLike.coe (ArithmeticFunction R) _ _ _
(ZeroHom.mk f hf) = f := rfl
@[simp]
theorem map_zero {f : ArithmeticFunction R} : f 0 = 0 :=
ZeroHom.map_zero' f
theorem coe_inj {f g : ArithmeticFunction R} : (f : ℕ → R) = g ↔ f = g :=
DFunLike.coe_fn_eq
@[simp]
theorem zero_apply {x : ℕ} : (0 : ArithmeticFunction R) x = 0 :=
ZeroHom.zero_apply x
@[ext]
theorem ext ⦃f g : ArithmeticFunction R⦄ (h : ∀ x, f x = g x) : f = g :=
ZeroHom.ext h
section One
variable [One R]
instance one : One (ArithmeticFunction R) :=
⟨⟨fun x => ite (x = 1) 1 0, rfl⟩⟩
theorem one_apply {x : ℕ} : (1 : ArithmeticFunction R) x = ite (x = 1) 1 0 :=
rfl
@[simp]
theorem one_one : (1 : ArithmeticFunction R) 1 = 1 :=
rfl
@[simp]
theorem one_apply_ne {x : ℕ} (h : x ≠ 1) : (1 : ArithmeticFunction R) x = 0 :=
if_neg h
end One
end Zero
/-- Coerce an arithmetic function with values in `ℕ` to one with values in `R`. We cannot inline
this in `natCoe` because it gets unfolded too much. -/
@[coe]
def natToArithmeticFunction [AddMonoidWithOne R] :
(ArithmeticFunction ℕ) → (ArithmeticFunction R) :=
fun f => ⟨fun n => ↑(f n), by simp⟩
instance natCoe [AddMonoidWithOne R] : Coe (ArithmeticFunction ℕ) (ArithmeticFunction R) :=
⟨natToArithmeticFunction⟩
@[simp]
theorem natCoe_nat (f : ArithmeticFunction ℕ) : natToArithmeticFunction f = f :=
ext fun _ => cast_id _
@[simp]
theorem natCoe_apply [AddMonoidWithOne R] {f : ArithmeticFunction ℕ} {x : ℕ} :
(f : ArithmeticFunction R) x = f x :=
rfl
/-- Coerce an arithmetic function with values in `ℤ` to one with values in `R`. We cannot inline
this in `intCoe` because it gets unfolded too much. -/
@[coe]
def ofInt [AddGroupWithOne R] :
(ArithmeticFunction ℤ) → (ArithmeticFunction R) :=
fun f => ⟨fun n => ↑(f n), by simp⟩
instance intCoe [AddGroupWithOne R] : Coe (ArithmeticFunction ℤ) (ArithmeticFunction R) :=
⟨ofInt⟩
@[simp]
theorem intCoe_int (f : ArithmeticFunction ℤ) : ofInt f = f :=
ext fun _ => Int.cast_id
@[simp]
theorem intCoe_apply [AddGroupWithOne R] {f : ArithmeticFunction ℤ} {x : ℕ} :
(f : ArithmeticFunction R) x = f x := rfl
@[simp]
theorem coe_coe [AddGroupWithOne R] {f : ArithmeticFunction ℕ} :
((f : ArithmeticFunction ℤ) : ArithmeticFunction R) = (f : ArithmeticFunction R) := by
ext
simp
@[simp]
theorem natCoe_one [AddMonoidWithOne R] :
((1 : ArithmeticFunction ℕ) : ArithmeticFunction R) = 1 := by
ext n
simp [one_apply]
@[simp]
theorem intCoe_one [AddGroupWithOne R] : ((1 : ArithmeticFunction ℤ) :
ArithmeticFunction R) = 1 := by
ext n
simp [one_apply]
section AddMonoid
variable [AddMonoid R]
instance add : Add (ArithmeticFunction R) :=
⟨fun f g => ⟨fun n => f n + g n, by simp⟩⟩
@[simp]
theorem add_apply {f g : ArithmeticFunction R} {n : ℕ} : (f + g) n = f n + g n :=
rfl
instance instAddMonoid : AddMonoid (ArithmeticFunction R) :=
{ ArithmeticFunction.zero R,
ArithmeticFunction.add with
add_assoc := fun _ _ _ => ext fun _ => add_assoc _ _ _
zero_add := fun _ => ext fun _ => zero_add _
add_zero := fun _ => ext fun _ => add_zero _
nsmul := nsmulRec }
end AddMonoid
instance instAddMonoidWithOne [AddMonoidWithOne R] : AddMonoidWithOne (ArithmeticFunction R) :=
{ ArithmeticFunction.instAddMonoid,
ArithmeticFunction.one with
natCast := fun n => ⟨fun x => if x = 1 then (n : R) else 0, by simp⟩
natCast_zero := by ext; simp
natCast_succ := fun n => by ext x; by_cases h : x = 1 <;> simp [h] }
instance instAddCommMonoid [AddCommMonoid R] : AddCommMonoid (ArithmeticFunction R) :=
{ ArithmeticFunction.instAddMonoid with add_comm := fun _ _ => ext fun _ => add_comm _ _ }
instance [NegZeroClass R] : Neg (ArithmeticFunction R) where
neg f := ⟨fun n => -f n, by simp⟩
instance [AddGroup R] : AddGroup (ArithmeticFunction R) :=
{ ArithmeticFunction.instAddMonoid with
neg_add_cancel := fun _ => ext fun _ => neg_add_cancel _
zsmul := zsmulRec }
instance [AddCommGroup R] : AddCommGroup (ArithmeticFunction R) :=
{ show AddGroup (ArithmeticFunction R) by infer_instance with
add_comm := fun _ _ ↦ add_comm _ _ }
section SMul
variable {M : Type*} [Zero R] [AddCommMonoid M] [SMul R M]
/-- The Dirichlet convolution of two arithmetic functions `f` and `g` is another arithmetic function
such that `(f * g) n` is the sum of `f x * g y` over all `(x,y)` such that `x * y = n`. -/
instance : SMul (ArithmeticFunction R) (ArithmeticFunction M) :=
⟨fun f g => ⟨fun n => ∑ x ∈ divisorsAntidiagonal n, f x.fst • g x.snd, by simp⟩⟩
@[simp]
theorem smul_apply {f : ArithmeticFunction R} {g : ArithmeticFunction M} {n : ℕ} :
(f • g) n = ∑ x ∈ divisorsAntidiagonal n, f x.fst • g x.snd :=
rfl
end SMul
/-- The Dirichlet convolution of two arithmetic functions `f` and `g` is another arithmetic function
such that `(f * g) n` is the sum of `f x * g y` over all `(x,y)` such that `x * y = n`. -/
instance [Semiring R] : Mul (ArithmeticFunction R) :=
⟨(· • ·)⟩
@[simp]
theorem mul_apply [Semiring R] {f g : ArithmeticFunction R} {n : ℕ} :
(f * g) n = ∑ x ∈ divisorsAntidiagonal n, f x.fst * g x.snd :=
rfl
theorem mul_apply_one [Semiring R] {f g : ArithmeticFunction R} : (f * g) 1 = f 1 * g 1 := by simp
@[simp, norm_cast]
theorem natCoe_mul [Semiring R] {f g : ArithmeticFunction ℕ} :
(↑(f * g) : ArithmeticFunction R) = f * g := by
ext n
simp
@[simp, norm_cast]
theorem intCoe_mul [Ring R] {f g : ArithmeticFunction ℤ} :
(↑(f * g) : ArithmeticFunction R) = ↑f * g := by
ext n
simp
section Module
variable {M : Type*} [Semiring R] [AddCommMonoid M] [Module R M]
theorem mul_smul' (f g : ArithmeticFunction R) (h : ArithmeticFunction M) :
(f * g) • h = f • g • h := by
ext n
simp only [mul_apply, smul_apply, sum_smul, mul_smul, smul_sum, Finset.sum_sigma']
apply Finset.sum_nbij' (fun ⟨⟨_i, j⟩, ⟨k, l⟩⟩ ↦ ⟨(k, l * j), (l, j)⟩)
(fun ⟨⟨i, _j⟩, ⟨k, l⟩⟩ ↦ ⟨(i * k, l), (i, k)⟩) <;> aesop (add simp mul_assoc)
theorem one_smul' (b : ArithmeticFunction M) : (1 : ArithmeticFunction R) • b = b := by
ext x
rw [smul_apply]
by_cases x0 : x = 0
· simp [x0]
have h : {(1, x)} ⊆ divisorsAntidiagonal x := by simp [x0]
rw [← sum_subset h]
· simp
intro y ymem ynmem
have y1ne : y.fst ≠ 1 := fun con => by simp_all [Prod.ext_iff]
simp [y1ne]
end Module
section Semiring
variable [Semiring R]
instance instMonoid : Monoid (ArithmeticFunction R) :=
{ one := One.one
mul := Mul.mul
one_mul := one_smul'
mul_one := fun f => by
ext x
rw [mul_apply]
by_cases x0 : x = 0
· simp [x0]
have h : {(x, 1)} ⊆ divisorsAntidiagonal x := by simp [x0]
rw [← sum_subset h]
· simp
intro ⟨y₁, y₂⟩ ymem ynmem
have y2ne : y₂ ≠ 1 := by
intro con
simp_all
simp [y2ne]
mul_assoc := mul_smul' }
instance instSemiring : Semiring (ArithmeticFunction R) :=
{ ArithmeticFunction.instAddMonoidWithOne,
ArithmeticFunction.instMonoid,
ArithmeticFunction.instAddCommMonoid with
zero_mul := fun f => by
ext
simp
mul_zero := fun f => by
ext
simp
left_distrib := fun a b c => by
ext
simp [← sum_add_distrib, mul_add]
right_distrib := fun a b c => by
ext
simp [← sum_add_distrib, add_mul] }
end Semiring
instance [CommSemiring R] : CommSemiring (ArithmeticFunction R) :=
{ ArithmeticFunction.instSemiring with
mul_comm := fun f g => by
ext
rw [mul_apply, ← map_swap_divisorsAntidiagonal, sum_map]
simp [mul_comm] }
instance [CommRing R] : CommRing (ArithmeticFunction R) :=
{ ArithmeticFunction.instSemiring with
neg_add_cancel := neg_add_cancel
mul_comm := mul_comm
zsmul := (· • ·) }
instance {M : Type*} [Semiring R] [AddCommMonoid M] [Module R M] :
Module (ArithmeticFunction R) (ArithmeticFunction M) where
one_smul := one_smul'
mul_smul := mul_smul'
smul_add r x y := by
ext
simp only [sum_add_distrib, smul_add, smul_apply, add_apply]
smul_zero r := by
ext
simp only [smul_apply, sum_const_zero, smul_zero, zero_apply]
add_smul r s x := by
ext
simp only [add_smul, sum_add_distrib, smul_apply, add_apply]
zero_smul r := by
ext
simp only [smul_apply, sum_const_zero, zero_smul, zero_apply]
section Zeta
/-- `ζ 0 = 0`, otherwise `ζ x = 1`. The Dirichlet Series is the Riemann `ζ`. -/
def zeta : ArithmeticFunction ℕ :=
⟨fun x => ite (x = 0) 0 1, rfl⟩
@[inherit_doc]
scoped[ArithmeticFunction] notation "ζ" => ArithmeticFunction.zeta
@[inherit_doc]
scoped[ArithmeticFunction.zeta] notation "ζ" => ArithmeticFunction.zeta
@[simp]
theorem zeta_apply {x : ℕ} : ζ x = if x = 0 then 0 else 1 :=
rfl
theorem zeta_apply_ne {x : ℕ} (h : x ≠ 0) : ζ x = 1 :=
if_neg h
-- Porting note: removed `@[simp]`, LHS not in normal form
theorem coe_zeta_smul_apply {M} [Semiring R] [AddCommMonoid M] [MulAction R M]
{f : ArithmeticFunction M} {x : ℕ} :
((↑ζ : ArithmeticFunction R) • f) x = ∑ i ∈ divisors x, f i := by
rw [smul_apply]
trans ∑ i ∈ divisorsAntidiagonal x, f i.snd
· refine sum_congr rfl fun i hi => ?_
rcases mem_divisorsAntidiagonal.1 hi with ⟨rfl, h⟩
rw [natCoe_apply, zeta_apply_ne (left_ne_zero_of_mul h), cast_one, one_smul]
· rw [← map_div_left_divisors, sum_map, Function.Embedding.coeFn_mk]
theorem coe_zeta_mul_apply [Semiring R] {f : ArithmeticFunction R} {x : ℕ} :
(↑ζ * f) x = ∑ i ∈ divisors x, f i :=
coe_zeta_smul_apply
theorem coe_mul_zeta_apply [Semiring R] {f : ArithmeticFunction R} {x : ℕ} :
(f * ζ) x = ∑ i ∈ divisors x, f i := by
rw [mul_apply]
trans ∑ i ∈ divisorsAntidiagonal x, f i.1
· refine sum_congr rfl fun i hi => ?_
rcases mem_divisorsAntidiagonal.1 hi with ⟨rfl, h⟩
rw [natCoe_apply, zeta_apply_ne (right_ne_zero_of_mul h), cast_one, mul_one]
· rw [← map_div_right_divisors, sum_map, Function.Embedding.coeFn_mk]
theorem zeta_mul_apply {f : ArithmeticFunction ℕ} {x : ℕ} : (ζ * f) x = ∑ i ∈ divisors x, f i := by
rw [← natCoe_nat ζ, coe_zeta_mul_apply]
theorem mul_zeta_apply {f : ArithmeticFunction ℕ} {x : ℕ} : (f * ζ) x = ∑ i ∈ divisors x, f i := by
rw [← natCoe_nat ζ, coe_mul_zeta_apply]
end Zeta
open ArithmeticFunction
section Pmul
/-- This is the pointwise product of `ArithmeticFunction`s. -/
def pmul [MulZeroClass R] (f g : ArithmeticFunction R) : ArithmeticFunction R :=
⟨fun x => f x * g x, by simp⟩
@[simp]
theorem pmul_apply [MulZeroClass R] {f g : ArithmeticFunction R} {x : ℕ} : f.pmul g x = f x * g x :=
rfl
theorem pmul_comm [CommMonoidWithZero R] (f g : ArithmeticFunction R) : f.pmul g = g.pmul f := by
ext
simp [mul_comm]
lemma pmul_assoc [SemigroupWithZero R] (f₁ f₂ f₃ : ArithmeticFunction R) :
pmul (pmul f₁ f₂) f₃ = pmul f₁ (pmul f₂ f₃) := by
ext
simp only [pmul_apply, mul_assoc]
section NonAssocSemiring
variable [NonAssocSemiring R]
@[simp]
theorem pmul_zeta (f : ArithmeticFunction R) : f.pmul ↑ζ = f := by
ext x
cases x <;> simp [Nat.succ_ne_zero]
@[simp]
theorem zeta_pmul (f : ArithmeticFunction R) : (ζ : ArithmeticFunction R).pmul f = f := by
ext x
cases x <;> simp [Nat.succ_ne_zero]
end NonAssocSemiring
variable [Semiring R]
/-- This is the pointwise power of `ArithmeticFunction`s. -/
def ppow (f : ArithmeticFunction R) (k : ℕ) : ArithmeticFunction R :=
if h0 : k = 0 then ζ else ⟨fun x ↦ f x ^ k, by simp_rw [map_zero, zero_pow h0]⟩
@[simp]
theorem ppow_zero {f : ArithmeticFunction R} : f.ppow 0 = ζ := by rw [ppow, dif_pos rfl]
@[simp]
theorem ppow_apply {f : ArithmeticFunction R} {k x : ℕ} (kpos : 0 < k) : f.ppow k x = f x ^ k := by
rw [ppow, dif_neg (Nat.ne_of_gt kpos), coe_mk]
theorem ppow_succ' {f : ArithmeticFunction R} {k : ℕ} : f.ppow (k + 1) = f.pmul (f.ppow k) := by
ext x
rw [ppow_apply (Nat.succ_pos k), _root_.pow_succ']
induction k <;> simp
theorem ppow_succ {f : ArithmeticFunction R} {k : ℕ} {kpos : 0 < k} :
f.ppow (k + 1) = (f.ppow k).pmul f := by
ext x
rw [ppow_apply (Nat.succ_pos k), _root_.pow_succ]
induction k <;> simp
end Pmul
section Pdiv
/-- This is the pointwise division of `ArithmeticFunction`s. -/
def pdiv [GroupWithZero R] (f g : ArithmeticFunction R) : ArithmeticFunction R :=
⟨fun n => f n / g n, by simp only [map_zero, ne_eq, not_true, div_zero]⟩
@[simp]
theorem pdiv_apply [GroupWithZero R] (f g : ArithmeticFunction R) (n : ℕ) :
pdiv f g n = f n / g n := rfl
/-- This result only holds for `DivisionSemiring`s instead of `GroupWithZero`s because zeta takes
values in ℕ, and hence the coercion requires an `AddMonoidWithOne`. TODO: Generalise zeta -/
@[simp]
theorem pdiv_zeta [DivisionSemiring R] (f : ArithmeticFunction R) :
pdiv f zeta = f := by
ext n
cases n <;> simp [succ_ne_zero]
end Pdiv
section ProdPrimeFactors
/-- The map $n \mapsto \prod_{p \mid n} f(p)$ as an arithmetic function -/
def prodPrimeFactors [CommMonoidWithZero R] (f : ℕ → R) : ArithmeticFunction R where
toFun d := if d = 0 then 0 else ∏ p ∈ d.primeFactors, f p
map_zero' := if_pos rfl
open Batteries.ExtendedBinder
/-- `∏ᵖ p ∣ n, f p` is custom notation for `prodPrimeFactors f n` -/
scoped syntax (name := bigproddvd) "∏ᵖ " extBinder " ∣ " term ", " term:67 : term
scoped macro_rules (kind := bigproddvd)
| `(∏ᵖ $x:ident ∣ $n, $r) => `(prodPrimeFactors (fun $x ↦ $r) $n)
@[simp]
theorem prodPrimeFactors_apply [CommMonoidWithZero R] {f : ℕ → R} {n : ℕ} (hn : n ≠ 0) :
∏ᵖ p ∣ n, f p = ∏ p ∈ n.primeFactors, f p :=
if_neg hn
end ProdPrimeFactors
/-- Multiplicative functions -/
def IsMultiplicative [MonoidWithZero R] (f : ArithmeticFunction R) : Prop :=
f 1 = 1 ∧ ∀ {m n : ℕ}, m.Coprime n → f (m * n) = f m * f n
namespace IsMultiplicative
section MonoidWithZero
variable [MonoidWithZero R]
@[simp, arith_mult]
theorem map_one {f : ArithmeticFunction R} (h : f.IsMultiplicative) : f 1 = 1 :=
h.1
@[simp]
theorem map_mul_of_coprime {f : ArithmeticFunction R} (hf : f.IsMultiplicative) {m n : ℕ}
(h : m.Coprime n) : f (m * n) = f m * f n :=
hf.2 h
end MonoidWithZero
open scoped Function in -- required for scoped `on` notation
theorem map_prod {ι : Type*} [CommMonoidWithZero R] (g : ι → ℕ) {f : ArithmeticFunction R}
(hf : f.IsMultiplicative) (s : Finset ι) (hs : (s : Set ι).Pairwise (Coprime on g)) :
f (∏ i ∈ s, g i) = ∏ i ∈ s, f (g i) := by
classical
induction s using Finset.induction_on with
| empty => simp [hf]
| insert _ _ has ih =>
rw [coe_insert, Set.pairwise_insert_of_symmetric (Coprime.symmetric.comap g)] at hs
rw [prod_insert has, prod_insert has, hf.map_mul_of_coprime, ih hs.1]
exact .prod_right fun i hi => hs.2 _ hi (hi.ne_of_not_mem has).symm
theorem map_prod_of_prime [CommMonoidWithZero R] {f : ArithmeticFunction R}
(h_mult : ArithmeticFunction.IsMultiplicative f)
(t : Finset ℕ) (ht : ∀ p ∈ t, p.Prime) :
f (∏ a ∈ t, a) = ∏ a ∈ t, f a :=
map_prod _ h_mult t fun x hx y hy hxy => (coprime_primes (ht x hx) (ht y hy)).mpr hxy
theorem map_prod_of_subset_primeFactors [CommMonoidWithZero R] {f : ArithmeticFunction R}
(h_mult : ArithmeticFunction.IsMultiplicative f) (l : ℕ)
(t : Finset ℕ) (ht : t ⊆ l.primeFactors) :
f (∏ a ∈ t, a) = ∏ a ∈ t, f a :=
map_prod_of_prime h_mult t fun _ a => prime_of_mem_primeFactors (ht a)
theorem map_div_of_coprime [GroupWithZero R] {f : ArithmeticFunction R}
(hf : IsMultiplicative f) {l d : ℕ} (hdl : d ∣ l) (hl : (l / d).Coprime d) (hd : f d ≠ 0) :
f (l / d) = f l / f d := by
apply (div_eq_of_eq_mul hd ..).symm
rw [← hf.right hl, Nat.div_mul_cancel hdl]
@[arith_mult]
theorem natCast {f : ArithmeticFunction ℕ} [Semiring R] (h : f.IsMultiplicative) :
IsMultiplicative (f : ArithmeticFunction R) :=
⟨by simp [h], fun {m n} cop => by simp [h.2 cop]⟩
@[arith_mult]
theorem intCast {f : ArithmeticFunction ℤ} [Ring R] (h : f.IsMultiplicative) :
IsMultiplicative (f : ArithmeticFunction R) :=
⟨by simp [h], fun {m n} cop => by simp [h.2 cop]⟩
@[arith_mult]
theorem mul [CommSemiring R] {f g : ArithmeticFunction R} (hf : f.IsMultiplicative)
(hg : g.IsMultiplicative) : IsMultiplicative (f * g) := by
refine ⟨by simp [hf.1, hg.1], ?_⟩
simp only [mul_apply]
intro m n cop
rw [sum_mul_sum, ← sum_product']
symm
apply sum_nbij fun ((i, j), k, l) ↦ (i * k, j * l)
· rintro ⟨⟨a1, a2⟩, ⟨b1, b2⟩⟩ h
simp only [mem_divisorsAntidiagonal, Ne, mem_product] at h
rcases h with ⟨⟨rfl, ha⟩, ⟨rfl, hb⟩⟩
simp only [mem_divisorsAntidiagonal, Nat.mul_eq_zero, Ne]
constructor
· ring
rw [Nat.mul_eq_zero] at *
apply not_or_intro ha hb
· simp only [Set.InjOn, mem_coe, mem_divisorsAntidiagonal, Ne, mem_product, Prod.mk_inj]
rintro ⟨⟨a1, a2⟩, ⟨b1, b2⟩⟩ ⟨⟨rfl, ha⟩, ⟨rfl, hb⟩⟩ ⟨⟨c1, c2⟩, ⟨d1, d2⟩⟩ hcd h
simp only [Prod.mk_inj] at h
ext <;> dsimp only
· trans Nat.gcd (a1 * a2) (a1 * b1)
· rw [Nat.gcd_mul_left, cop.coprime_mul_left.coprime_mul_right_right.gcd_eq_one, mul_one]
· rw [← hcd.1.1, ← hcd.2.1] at cop
rw [← hcd.1.1, h.1, Nat.gcd_mul_left,
cop.coprime_mul_left.coprime_mul_right_right.gcd_eq_one, mul_one]
· trans Nat.gcd (a1 * a2) (a2 * b2)
· rw [mul_comm, Nat.gcd_mul_left, cop.coprime_mul_right.coprime_mul_left_right.gcd_eq_one,
mul_one]
· rw [← hcd.1.1, ← hcd.2.1] at cop
rw [← hcd.1.1, h.2, mul_comm, Nat.gcd_mul_left,
cop.coprime_mul_right.coprime_mul_left_right.gcd_eq_one, mul_one]
· trans Nat.gcd (b1 * b2) (a1 * b1)
· rw [mul_comm, Nat.gcd_mul_right,
cop.coprime_mul_right.coprime_mul_left_right.symm.gcd_eq_one, one_mul]
· rw [← hcd.1.1, ← hcd.2.1] at cop
rw [← hcd.2.1, h.1, mul_comm c1 d1, Nat.gcd_mul_left,
cop.coprime_mul_right.coprime_mul_left_right.symm.gcd_eq_one, mul_one]
· trans Nat.gcd (b1 * b2) (a2 * b2)
· rw [Nat.gcd_mul_right, cop.coprime_mul_left.coprime_mul_right_right.symm.gcd_eq_one,
one_mul]
· rw [← hcd.1.1, ← hcd.2.1] at cop
rw [← hcd.2.1, h.2, Nat.gcd_mul_right,
cop.coprime_mul_left.coprime_mul_right_right.symm.gcd_eq_one, one_mul]
· simp only [Set.SurjOn, Set.subset_def, mem_coe, mem_divisorsAntidiagonal, Ne, mem_product,
Set.mem_image, exists_prop, Prod.mk_inj]
rintro ⟨b1, b2⟩ h
dsimp at h
use ((b1.gcd m, b2.gcd m), (b1.gcd n, b2.gcd n))
rw [← cop.gcd_mul _, ← cop.gcd_mul _, ← h.1, Nat.gcd_mul_gcd_of_coprime_of_mul_eq_mul cop h.1,
Nat.gcd_mul_gcd_of_coprime_of_mul_eq_mul cop.symm _]
· rw [Nat.mul_eq_zero, not_or] at h
simp [h.2.1, h.2.2]
rw [mul_comm n m, h.1]
· simp only [mem_divisorsAntidiagonal, Ne, mem_product]
rintro ⟨⟨a1, a2⟩, ⟨b1, b2⟩⟩ ⟨⟨rfl, ha⟩, ⟨rfl, hb⟩⟩
dsimp only
rw [hf.map_mul_of_coprime cop.coprime_mul_right.coprime_mul_right_right,
hg.map_mul_of_coprime cop.coprime_mul_left.coprime_mul_left_right]
ring
@[arith_mult]
theorem pmul [CommSemiring R] {f g : ArithmeticFunction R} (hf : f.IsMultiplicative)
(hg : g.IsMultiplicative) : IsMultiplicative (f.pmul g) :=
⟨by simp [hf, hg], fun {m n} cop => by
simp only [pmul_apply, hf.map_mul_of_coprime cop, hg.map_mul_of_coprime cop]
ring⟩
@[arith_mult]
theorem pdiv [CommGroupWithZero R] {f g : ArithmeticFunction R} (hf : IsMultiplicative f)
(hg : IsMultiplicative g) : IsMultiplicative (pdiv f g) :=
⟨by simp [hf, hg], fun {m n} cop => by
simp only [pdiv_apply, map_mul_of_coprime hf cop, map_mul_of_coprime hg cop,
div_eq_mul_inv, mul_inv]
apply mul_mul_mul_comm ⟩
/-- For any multiplicative function `f` and any `n > 0`,
we can evaluate `f n` by evaluating `f` at `p ^ k` over the factorization of `n` -/
theorem multiplicative_factorization [CommMonoidWithZero R] (f : ArithmeticFunction R)
(hf : f.IsMultiplicative) {n : ℕ} (hn : n ≠ 0) :
f n = n.factorization.prod fun p k => f (p ^ k) :=
Nat.multiplicative_factorization f (fun _ _ => hf.2) hf.1 hn
/-- A recapitulation of the definition of multiplicative that is simpler for proofs -/
theorem iff_ne_zero [MonoidWithZero R] {f : ArithmeticFunction R} :
IsMultiplicative f ↔
f 1 = 1 ∧ ∀ {m n : ℕ}, m ≠ 0 → n ≠ 0 → m.Coprime n → f (m * n) = f m * f n := by
refine and_congr_right' (forall₂_congr fun m n => ⟨fun h _ _ => h, fun h hmn => ?_⟩)
rcases eq_or_ne m 0 with (rfl | hm)
· simp
rcases eq_or_ne n 0 with (rfl | hn)
· simp
exact h hm hn hmn
/-- Two multiplicative functions `f` and `g` are equal if and only if
they agree on prime powers -/
theorem eq_iff_eq_on_prime_powers [CommMonoidWithZero R] (f : ArithmeticFunction R)
(hf : f.IsMultiplicative) (g : ArithmeticFunction R) (hg : g.IsMultiplicative) :
f = g ↔ ∀ p i : ℕ, Nat.Prime p → f (p ^ i) = g (p ^ i) := by
constructor
· intro h p i _
rw [h]
intro h
ext n
by_cases hn : n = 0
· rw [hn, ArithmeticFunction.map_zero, ArithmeticFunction.map_zero]
rw [multiplicative_factorization f hf hn, multiplicative_factorization g hg hn]
exact Finset.prod_congr rfl fun p hp ↦ h p _ (Nat.prime_of_mem_primeFactors hp)
@[arith_mult]
theorem prodPrimeFactors [CommMonoidWithZero R] (f : ℕ → R) :
IsMultiplicative (prodPrimeFactors f) := by
rw [iff_ne_zero]
simp only [ne_eq, one_ne_zero, not_false_eq_true, prodPrimeFactors_apply, primeFactors_one,
prod_empty, true_and]
intro x y hx hy hxy
have hxy₀ : x * y ≠ 0 := mul_ne_zero hx hy
rw [prodPrimeFactors_apply hxy₀, prodPrimeFactors_apply hx, prodPrimeFactors_apply hy,
Nat.primeFactors_mul hx hy, ← Finset.prod_union hxy.disjoint_primeFactors]
theorem prodPrimeFactors_add_of_squarefree [CommSemiring R] {f g : ArithmeticFunction R}
(hf : IsMultiplicative f) (hg : IsMultiplicative g) {n : ℕ} (hn : Squarefree n) :
∏ᵖ p ∣ n, (f + g) p = (f * g) n := by
rw [prodPrimeFactors_apply hn.ne_zero]
simp_rw [add_apply (f := f) (g := g)]
rw [Finset.prod_add, mul_apply, sum_divisorsAntidiagonal (f · * g ·),
← divisors_filter_squarefree_of_squarefree hn, sum_divisors_filter_squarefree hn.ne_zero,
factors_eq]
apply Finset.sum_congr rfl
intro t ht
rw [t.prod_val, Function.id_def,
← prod_primeFactors_sdiff_of_squarefree hn (Finset.mem_powerset.mp ht),
hf.map_prod_of_subset_primeFactors n t (Finset.mem_powerset.mp ht),
← hg.map_prod_of_subset_primeFactors n (_ \ t) Finset.sdiff_subset]
theorem lcm_apply_mul_gcd_apply [CommMonoidWithZero R] {f : ArithmeticFunction R}
(hf : f.IsMultiplicative) {x y : ℕ} :
f (x.lcm y) * f (x.gcd y) = f x * f y := by
by_cases hx : x = 0
· simp only [hx, f.map_zero, zero_mul, Nat.lcm_zero_left, Nat.gcd_zero_left]
by_cases hy : y = 0
· simp only [hy, f.map_zero, mul_zero, Nat.lcm_zero_right, Nat.gcd_zero_right, zero_mul]
have hgcd_ne_zero : x.gcd y ≠ 0 := gcd_ne_zero_left hx
have hlcm_ne_zero : x.lcm y ≠ 0 := lcm_ne_zero hx hy
have hfi_zero : ∀ {i}, f (i ^ 0) = 1 := by
intro i; rw [Nat.pow_zero, hf.1]
iterate 4 rw [hf.multiplicative_factorization f (by assumption),
Finsupp.prod_of_support_subset _ _ _ (fun _ _ => hfi_zero)
(s := (x.primeFactors ∪ y.primeFactors))]
· rw [← Finset.prod_mul_distrib, ← Finset.prod_mul_distrib]
apply Finset.prod_congr rfl
intro p _
rcases Nat.le_or_le (x.factorization p) (y.factorization p) with h | h <;>
simp only [factorization_lcm hx hy, Finsupp.sup_apply, h, sup_of_le_right,
sup_of_le_left, inf_of_le_right, Nat.factorization_gcd hx hy, Finsupp.inf_apply,
inf_of_le_left, mul_comm]
· apply Finset.subset_union_right
· apply Finset.subset_union_left
· rw [factorization_gcd hx hy, Finsupp.support_inf]
apply Finset.inter_subset_union
· simp [factorization_lcm hx hy]
theorem map_gcd [CommGroupWithZero R] {f : ArithmeticFunction R}
(hf : f.IsMultiplicative) {x y : ℕ} (hf_lcm : f (x.lcm y) ≠ 0) :
f (x.gcd y) = f x * f y / f (x.lcm y) := by
rw [← hf.lcm_apply_mul_gcd_apply, mul_div_cancel_left₀ _ hf_lcm]
theorem map_lcm [CommGroupWithZero R] {f : ArithmeticFunction R}
(hf : f.IsMultiplicative) {x y : ℕ} (hf_gcd : f (x.gcd y) ≠ 0) :
f (x.lcm y) = f x * f y / f (x.gcd y) := by
rw [← hf.lcm_apply_mul_gcd_apply, mul_div_cancel_right₀ _ hf_gcd]
theorem eq_zero_of_squarefree_of_dvd_eq_zero [MonoidWithZero R] {f : ArithmeticFunction R}
(hf : IsMultiplicative f) {m n : ℕ} (hn : Squarefree n) (hmn : m ∣ n)
(h_zero : f m = 0) :
f n = 0 := by
rcases hmn with ⟨k, rfl⟩
simp only [MulZeroClass.zero_mul, eq_self_iff_true, hf.map_mul_of_coprime
(coprime_of_squarefree_mul hn), h_zero]
end IsMultiplicative
section SpecialFunctions
/-- The identity on `ℕ` as an `ArithmeticFunction`. -/
def id : ArithmeticFunction ℕ :=
⟨_root_.id, rfl⟩
@[simp]
theorem id_apply {x : ℕ} : id x = x :=
rfl
/-- `pow k n = n ^ k`, except `pow 0 0 = 0`. -/
def pow (k : ℕ) : ArithmeticFunction ℕ :=
id.ppow k
@[simp]
theorem pow_apply {k n : ℕ} : pow k n = if k = 0 ∧ n = 0 then 0 else n ^ k := by
cases k <;> simp [pow]
theorem pow_zero_eq_zeta : pow 0 = ζ := by
ext n
simp
/-- `σ k n` is the sum of the `k`th powers of the divisors of `n` -/
def sigma (k : ℕ) : ArithmeticFunction ℕ :=
⟨fun n => ∑ d ∈ divisors n, d ^ k, by simp⟩
@[inherit_doc]
scoped[ArithmeticFunction] notation "σ" => ArithmeticFunction.sigma
@[inherit_doc]
scoped[ArithmeticFunction.sigma] notation "σ" => ArithmeticFunction.sigma
theorem sigma_apply {k n : ℕ} : σ k n = ∑ d ∈ divisors n, d ^ k :=
rfl
theorem sigma_apply_prime_pow {k p i : ℕ} (hp : p.Prime) :
σ k (p ^ i) = ∑ j ∈ .range (i + 1), p ^ (j * k) := by
simp [sigma_apply, divisors_prime_pow hp, Nat.pow_mul]
theorem sigma_one_apply (n : ℕ) : σ 1 n = ∑ d ∈ divisors n, d := by simp [sigma_apply]
theorem sigma_one_apply_prime_pow {p i : ℕ} (hp : p.Prime) :
σ 1 (p ^ i) = ∑ k ∈ .range (i + 1), p ^ k := by
simp [sigma_apply_prime_pow hp]
theorem sigma_zero_apply (n : ℕ) : σ 0 n = #n.divisors := by simp [sigma_apply]
theorem sigma_zero_apply_prime_pow {p i : ℕ} (hp : p.Prime) : σ 0 (p ^ i) = i + 1 := by
simp [sigma_apply_prime_pow hp]
theorem zeta_mul_pow_eq_sigma {k : ℕ} : ζ * pow k = σ k := by
ext
rw [sigma, zeta_mul_apply]
apply sum_congr rfl
intro x hx
rw [pow_apply, if_neg (not_and_of_not_right _ _)]
contrapose! hx
simp [hx]
@[arith_mult]
theorem isMultiplicative_one [MonoidWithZero R] : IsMultiplicative (1 : ArithmeticFunction R) :=
IsMultiplicative.iff_ne_zero.2
⟨by simp, by
intro m n hm _hn hmn
rcases eq_or_ne m 1 with (rfl | hm')
· simp
rw [one_apply_ne, one_apply_ne hm', zero_mul]
rw [Ne, mul_eq_one, not_and_or]
exact Or.inl hm'⟩
@[arith_mult]
theorem isMultiplicative_zeta : IsMultiplicative ζ :=
IsMultiplicative.iff_ne_zero.2 ⟨by simp, by simp +contextual⟩
@[arith_mult]
theorem isMultiplicative_id : IsMultiplicative ArithmeticFunction.id :=
⟨rfl, fun {_ _} _ => rfl⟩
@[arith_mult]
theorem IsMultiplicative.ppow [CommSemiring R] {f : ArithmeticFunction R} (hf : f.IsMultiplicative)
{k : ℕ} : IsMultiplicative (f.ppow k) := by
induction k with
| zero => exact isMultiplicative_zeta.natCast
| succ k hi => rw [ppow_succ']; apply hf.pmul hi
@[arith_mult]
theorem isMultiplicative_pow {k : ℕ} : IsMultiplicative (pow k) :=
isMultiplicative_id.ppow
@[arith_mult]
theorem isMultiplicative_sigma {k : ℕ} : IsMultiplicative (σ k) := by
rw [← zeta_mul_pow_eq_sigma]
apply isMultiplicative_zeta.mul isMultiplicative_pow
/-- `Ω n` is the number of prime factors of `n`. -/
def cardFactors : ArithmeticFunction ℕ :=
⟨fun n => n.primeFactorsList.length, by simp⟩
@[inherit_doc]
scoped[ArithmeticFunction] notation "Ω" => ArithmeticFunction.cardFactors
@[inherit_doc]
scoped[ArithmeticFunction.Omega] notation "Ω" => ArithmeticFunction.cardFactors
theorem cardFactors_apply {n : ℕ} : Ω n = n.primeFactorsList.length :=
rfl
lemma cardFactors_zero : Ω 0 = 0 := by simp
@[simp] theorem cardFactors_one : Ω 1 = 0 := by simp [cardFactors_apply]
@[simp]
theorem cardFactors_eq_one_iff_prime {n : ℕ} : Ω n = 1 ↔ n.Prime := by
refine ⟨fun h => ?_, fun h => List.length_eq_one_iff.2 ⟨n, primeFactorsList_prime h⟩⟩
cases n with | zero => simp at h | succ n =>
rcases List.length_eq_one_iff.1 h with ⟨x, hx⟩
rw [← prod_primeFactorsList n.add_one_ne_zero, hx, List.prod_singleton]
apply prime_of_mem_primeFactorsList
rw [hx, List.mem_singleton]
theorem cardFactors_mul {m n : ℕ} (m0 : m ≠ 0) (n0 : n ≠ 0) : Ω (m * n) = Ω m + Ω n := by
rw [cardFactors_apply, cardFactors_apply, cardFactors_apply, ← Multiset.coe_card, ← factors_eq,
UniqueFactorizationMonoid.normalizedFactors_mul m0 n0, factors_eq, factors_eq,
| Multiset.card_add, Multiset.coe_card, Multiset.coe_card]
theorem cardFactors_multiset_prod {s : Multiset ℕ} (h0 : s.prod ≠ 0) :
Ω s.prod = (Multiset.map Ω s).sum := by
induction s using Multiset.induction_on with
| empty => simp
| cons ih => simp_all [cardFactors_mul, not_or]
| Mathlib/NumberTheory/ArithmeticFunction.lean | 898 | 905 |
/-
Copyright (c) 2022 Violeta Hernández Palacios. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Violeta Hernández Palacios
-/
import Mathlib.SetTheory.Ordinal.Family
import Mathlib.Tactic.Abel
/-!
# Natural operations on ordinals
The goal of this file is to define natural addition and multiplication on ordinals, also known as
the Hessenberg sum and product, and provide a basic API. The natural addition of two ordinals
`a ♯ b` is recursively defined as the least ordinal greater than `a' ♯ b` and `a ♯ b'` for `a' < a`
and `b' < b`. The natural multiplication `a ⨳ b` is likewise recursively defined as the least
ordinal such that `a ⨳ b ♯ a' ⨳ b'` is greater than `a' ⨳ b ♯ a ⨳ b'` for any `a' < a` and
`b' < b`.
These operations form a rich algebraic structure: they're commutative, associative, preserve order,
have the usual `0` and `1` from ordinals, and distribute over one another.
Moreover, these operations are the addition and multiplication of ordinals when viewed as
combinatorial `Game`s. This makes them particularly useful for game theory.
Finally, both operations admit simple, intuitive descriptions in terms of the Cantor normal form.
The natural addition of two ordinals corresponds to adding their Cantor normal forms as if they were
polynomials in `ω`. Likewise, their natural multiplication corresponds to multiplying the Cantor
normal forms as polynomials.
## Implementation notes
Given the rich algebraic structure of these two operations, we choose to create a type synonym
`NatOrdinal`, where we provide the appropriate instances. However, to avoid casting back and forth
between both types, we attempt to prove and state most results on `Ordinal`.
## Todo
- Prove the characterizations of natural addition and multiplication in terms of the Cantor normal
form.
-/
universe u v
open Function Order Set
noncomputable section
/-! ### Basic casts between `Ordinal` and `NatOrdinal` -/
/-- A type synonym for ordinals with natural addition and multiplication. -/
def NatOrdinal : Type _ :=
Ordinal deriving Zero, Inhabited, One, WellFoundedRelation
-- The `LinearOrder, `SuccOrder` instances should be constructed by a deriving handler.
-- https://github.com/leanprover-community/mathlib4/issues/380
instance NatOrdinal.instLinearOrder : LinearOrder NatOrdinal := Ordinal.instLinearOrder
instance NatOrdinal.instSuccOrder : SuccOrder NatOrdinal := Ordinal.instSuccOrder
instance NatOrdinal.instOrderBot : OrderBot NatOrdinal := Ordinal.instOrderBot
instance NatOrdinal.instNoMaxOrder : NoMaxOrder NatOrdinal := Ordinal.instNoMaxOrder
instance NatOrdinal.instZeroLEOneClass : ZeroLEOneClass NatOrdinal := Ordinal.instZeroLEOneClass
instance NatOrdinal.instNeZeroOne : NeZero (1 : NatOrdinal) := Ordinal.instNeZeroOne
instance NatOrdinal.uncountable : Uncountable NatOrdinal :=
Ordinal.uncountable
/-- The identity function between `Ordinal` and `NatOrdinal`. -/
@[match_pattern]
def Ordinal.toNatOrdinal : Ordinal ≃o NatOrdinal :=
OrderIso.refl _
/-- The identity function between `NatOrdinal` and `Ordinal`. -/
@[match_pattern]
def NatOrdinal.toOrdinal : NatOrdinal ≃o Ordinal :=
OrderIso.refl _
namespace NatOrdinal
open Ordinal
@[simp]
theorem toOrdinal_symm_eq : NatOrdinal.toOrdinal.symm = Ordinal.toNatOrdinal :=
rfl
@[simp]
theorem toOrdinal_toNatOrdinal (a : NatOrdinal) : a.toOrdinal.toNatOrdinal = a :=
rfl
theorem lt_wf : @WellFounded NatOrdinal (· < ·) :=
Ordinal.lt_wf
instance : WellFoundedLT NatOrdinal :=
Ordinal.wellFoundedLT
instance : ConditionallyCompleteLinearOrderBot NatOrdinal :=
WellFoundedLT.conditionallyCompleteLinearOrderBot _
@[simp] theorem bot_eq_zero : (⊥ : NatOrdinal) = 0 := rfl
@[simp] theorem toOrdinal_zero : toOrdinal 0 = 0 := rfl
@[simp] theorem toOrdinal_one : toOrdinal 1 = 1 := rfl
@[simp] theorem toOrdinal_eq_zero {a} : toOrdinal a = 0 ↔ a = 0 := Iff.rfl
@[simp] theorem toOrdinal_eq_one {a} : toOrdinal a = 1 ↔ a = 1 := Iff.rfl
@[simp]
theorem toOrdinal_max (a b : NatOrdinal) : toOrdinal (max a b) = max (toOrdinal a) (toOrdinal b) :=
rfl
@[simp]
theorem toOrdinal_min (a b : NatOrdinal) : toOrdinal (min a b) = min (toOrdinal a) (toOrdinal b) :=
rfl
theorem succ_def (a : NatOrdinal) : succ a = toNatOrdinal (toOrdinal a + 1) :=
rfl
@[simp]
theorem zero_le (o : NatOrdinal) : 0 ≤ o :=
Ordinal.zero_le o
theorem not_lt_zero (o : NatOrdinal) : ¬ o < 0 :=
Ordinal.not_lt_zero o
@[simp]
theorem lt_one_iff_zero {o : NatOrdinal} : o < 1 ↔ o = 0 :=
Ordinal.lt_one_iff_zero
/-- A recursor for `NatOrdinal`. Use as `induction x`. -/
@[elab_as_elim, cases_eliminator, induction_eliminator]
protected def rec {β : NatOrdinal → Sort*} (h : ∀ a, β (toNatOrdinal a)) : ∀ a, β a := fun a =>
h (toOrdinal a)
/-- `Ordinal.induction` but for `NatOrdinal`. -/
theorem induction {p : NatOrdinal → Prop} : ∀ (i) (_ : ∀ j, (∀ k, k < j → p k) → p j), p i :=
Ordinal.induction
instance small_Iio (a : NatOrdinal.{u}) : Small.{u} (Set.Iio a) := Ordinal.small_Iio a
instance small_Iic (a : NatOrdinal.{u}) : Small.{u} (Set.Iic a) := Ordinal.small_Iic a
instance small_Ico (a b : NatOrdinal.{u}) : Small.{u} (Set.Ico a b) := Ordinal.small_Ico a b
instance small_Icc (a b : NatOrdinal.{u}) : Small.{u} (Set.Icc a b) := Ordinal.small_Icc a b
instance small_Ioo (a b : NatOrdinal.{u}) : Small.{u} (Set.Ioo a b) := Ordinal.small_Ioo a b
instance small_Ioc (a b : NatOrdinal.{u}) : Small.{u} (Set.Ioc a b) := Ordinal.small_Ioc a b
end NatOrdinal
namespace Ordinal
variable {a b c : Ordinal.{u}}
@[simp] theorem toNatOrdinal_symm_eq : toNatOrdinal.symm = NatOrdinal.toOrdinal := rfl
@[simp] theorem toNatOrdinal_toOrdinal (a : Ordinal) : a.toNatOrdinal.toOrdinal = a := rfl
@[simp] theorem toNatOrdinal_zero : toNatOrdinal 0 = 0 := rfl
@[simp] theorem toNatOrdinal_one : toNatOrdinal 1 = 1 := rfl
@[simp] theorem toNatOrdinal_eq_zero (a) : toNatOrdinal a = 0 ↔ a = 0 := Iff.rfl
@[simp] theorem toNatOrdinal_eq_one (a) : toNatOrdinal a = 1 ↔ a = 1 := Iff.rfl
@[simp]
theorem toNatOrdinal_max (a b : Ordinal) :
toNatOrdinal (max a b) = max (toNatOrdinal a) (toNatOrdinal b) :=
rfl
@[simp]
theorem toNatOrdinal_min (a b : Ordinal) :
toNatOrdinal (min a b) = min (toNatOrdinal a) (toNatOrdinal b) :=
rfl
/-! We place the definitions of `nadd` and `nmul` before actually developing their API, as this
guarantees we only need to open the `NaturalOps` locale once. -/
/-- Natural addition on ordinals `a ♯ b`, also known as the Hessenberg sum, is recursively defined
as the least ordinal greater than `a' ♯ b` and `a ♯ b'` for all `a' < a` and `b' < b`. In contrast
to normal ordinal addition, it is commutative.
Natural addition can equivalently be characterized as the ordinal resulting from adding up
corresponding coefficients in the Cantor normal forms of `a` and `b`. -/
noncomputable def nadd (a b : Ordinal.{u}) : Ordinal.{u} :=
max (⨆ x : Iio a, succ (nadd x.1 b)) (⨆ x : Iio b, succ (nadd a x.1))
termination_by (a, b)
decreasing_by all_goals cases x; decreasing_tactic
@[inherit_doc]
scoped[NaturalOps] infixl:65 " ♯ " => Ordinal.nadd
open NaturalOps
/-- Natural multiplication on ordinals `a ⨳ b`, also known as the Hessenberg product, is recursively
defined as the least ordinal such that `a ⨳ b ♯ a' ⨳ b'` is greater than `a' ⨳ b ♯ a ⨳ b'` for all
`a' < a` and `b < b'`. In contrast to normal ordinal multiplication, it is commutative and
distributive (over natural addition).
Natural multiplication can equivalently be characterized as the ordinal resulting from multiplying
the Cantor normal forms of `a` and `b` as if they were polynomials in `ω`. Addition of exponents is
done via natural addition. -/
noncomputable def nmul (a b : Ordinal.{u}) : Ordinal.{u} :=
sInf {c | ∀ a' < a, ∀ b' < b, nmul a' b ♯ nmul a b' < c ♯ nmul a' b'}
termination_by (a, b)
@[inherit_doc]
scoped[NaturalOps] infixl:70 " ⨳ " => Ordinal.nmul
/-! ### Natural addition -/
theorem lt_nadd_iff : a < b ♯ c ↔ (∃ b' < b, a ≤ b' ♯ c) ∨ ∃ c' < c, a ≤ b ♯ c' := by
rw [nadd]
simp [Ordinal.lt_iSup_iff]
theorem nadd_le_iff : b ♯ c ≤ a ↔ (∀ b' < b, b' ♯ c < a) ∧ ∀ c' < c, b ♯ c' < a := by
rw [← not_lt, lt_nadd_iff]
simp
theorem nadd_lt_nadd_left (h : b < c) (a) : a ♯ b < a ♯ c :=
lt_nadd_iff.2 (Or.inr ⟨b, h, le_rfl⟩)
theorem nadd_lt_nadd_right (h : b < c) (a) : b ♯ a < c ♯ a :=
lt_nadd_iff.2 (Or.inl ⟨b, h, le_rfl⟩)
theorem nadd_le_nadd_left (h : b ≤ c) (a) : a ♯ b ≤ a ♯ c := by
rcases lt_or_eq_of_le h with (h | rfl)
· exact (nadd_lt_nadd_left h a).le
· exact le_rfl
theorem nadd_le_nadd_right (h : b ≤ c) (a) : b ♯ a ≤ c ♯ a := by
rcases lt_or_eq_of_le h with (h | rfl)
· exact (nadd_lt_nadd_right h a).le
· exact le_rfl
variable (a b)
theorem nadd_comm (a b) : a ♯ b = b ♯ a := by
rw [nadd, nadd, max_comm]
congr <;> ext x <;> cases x <;> apply congr_arg _ (nadd_comm _ _)
termination_by (a, b)
@[deprecated "blsub will soon be deprecated" (since := "2024-11-18")]
theorem blsub_nadd_of_mono {f : ∀ c < a ♯ b, Ordinal.{max u v}}
(hf : ∀ {i j} (hi hj), i ≤ j → f i hi ≤ f j hj) :
blsub.{u,v} _ f =
max (blsub.{u, v} a fun a' ha' => f (a' ♯ b) <| nadd_lt_nadd_right ha' b)
(blsub.{u, v} b fun b' hb' => f (a ♯ b') <| nadd_lt_nadd_left hb' a) := by
apply (blsub_le_iff.2 fun i h => _).antisymm (max_le _ _)
· intro i h
rcases lt_nadd_iff.1 h with (⟨a', ha', hi⟩ | ⟨b', hb', hi⟩)
· exact lt_max_of_lt_left ((hf h (nadd_lt_nadd_right ha' b) hi).trans_lt (lt_blsub _ _ ha'))
· exact lt_max_of_lt_right ((hf h (nadd_lt_nadd_left hb' a) hi).trans_lt (lt_blsub _ _ hb'))
all_goals
apply blsub_le_of_brange_subset.{u, u, v}
rintro c ⟨d, hd, rfl⟩
apply mem_brange_self
private theorem iSup_nadd_of_monotone {a b} (f : Ordinal.{u} → Ordinal.{u}) (h : Monotone f) :
⨆ x : Iio (a ♯ b), f x = max (⨆ a' : Iio a, f (a'.1 ♯ b)) (⨆ b' : Iio b, f (a ♯ b'.1)) := by
apply (max_le _ _).antisymm'
· rw [Ordinal.iSup_le_iff]
rintro ⟨i, hi⟩
obtain ⟨x, hx, hi⟩ | ⟨x, hx, hi⟩ := lt_nadd_iff.1 hi
· exact le_max_of_le_left ((h hi).trans <| Ordinal.le_iSup (fun x : Iio a ↦ _) ⟨x, hx⟩)
· exact le_max_of_le_right ((h hi).trans <| Ordinal.le_iSup (fun x : Iio b ↦ _) ⟨x, hx⟩)
all_goals
apply csSup_le_csSup' (bddAbove_of_small _)
rintro _ ⟨⟨c, hc⟩, rfl⟩
refine mem_range_self (⟨_, ?_⟩ : Iio _)
apply_rules [nadd_lt_nadd_left, nadd_lt_nadd_right]
theorem nadd_assoc (a b c) : a ♯ b ♯ c = a ♯ (b ♯ c) := by
unfold nadd
rw [iSup_nadd_of_monotone fun a' ↦ succ (a' ♯ c), iSup_nadd_of_monotone fun b' ↦ succ (a ♯ b'),
max_assoc]
· congr <;> ext x <;> cases x <;> apply congr_arg _ (nadd_assoc _ _ _)
· exact succ_mono.comp fun x y h ↦ nadd_le_nadd_left h _
· exact succ_mono.comp fun x y h ↦ nadd_le_nadd_right h _
termination_by (a, b, c)
@[simp]
theorem nadd_zero (a : Ordinal) : a ♯ 0 = a := by
rw [nadd, ciSup_of_empty fun _ : Iio 0 ↦ _, sup_bot_eq]
convert iSup_succ a
rename_i x
cases x
exact nadd_zero _
termination_by a
@[simp]
theorem zero_nadd : 0 ♯ a = a := by rw [nadd_comm, nadd_zero]
@[simp]
theorem nadd_one (a : Ordinal) : a ♯ 1 = succ a := by
rw [nadd, ciSup_unique (s := fun _ : Iio 1 ↦ _), Iio_one_default_eq, nadd_zero,
max_eq_right_iff, Ordinal.iSup_le_iff]
rintro ⟨i, hi⟩
rwa [nadd_one, succ_le_succ_iff, succ_le_iff]
termination_by a
@[simp]
theorem one_nadd : 1 ♯ a = succ a := by rw [nadd_comm, nadd_one]
theorem nadd_succ : a ♯ succ b = succ (a ♯ b) := by rw [← nadd_one (a ♯ b), nadd_assoc, nadd_one]
theorem succ_nadd : succ a ♯ b = succ (a ♯ b) := by rw [← one_nadd (a ♯ b), ← nadd_assoc, one_nadd]
@[simp]
theorem nadd_nat (n : ℕ) : a ♯ n = a + n := by
induction' n with n hn
· simp
· rw [Nat.cast_succ, add_one_eq_succ, nadd_succ, add_succ, hn]
@[simp]
theorem nat_nadd (n : ℕ) : ↑n ♯ a = a + n := by rw [nadd_comm, nadd_nat]
theorem add_le_nadd : a + b ≤ a ♯ b := by
induction b using limitRecOn with
| zero => simp
| succ c h =>
rwa [add_succ, nadd_succ, succ_le_succ_iff]
| isLimit c hc H =>
rw [(isNormal_add_right a).apply_of_isLimit hc, Ordinal.iSup_le_iff]
rintro ⟨i, hi⟩
exact (H i hi).trans (nadd_le_nadd_left hi.le a)
end Ordinal
namespace NatOrdinal
open Ordinal NaturalOps
instance : Add NatOrdinal := ⟨nadd⟩
instance : SuccAddOrder NatOrdinal := ⟨fun x => (nadd_one x).symm⟩
theorem lt_add_iff {a b c : NatOrdinal} :
a < b + c ↔ (∃ b' < b, a ≤ b' + c) ∨ ∃ c' < c, a ≤ b + c' :=
Ordinal.lt_nadd_iff
theorem add_le_iff {a b c : NatOrdinal} :
b + c ≤ a ↔ (∀ b' < b, b' + c < a) ∧ ∀ c' < c, b + c' < a :=
Ordinal.nadd_le_iff
instance : AddLeftStrictMono NatOrdinal.{u} :=
⟨fun a _ _ h => nadd_lt_nadd_left h a⟩
instance : AddLeftMono NatOrdinal.{u} :=
⟨fun a _ _ h => nadd_le_nadd_left h a⟩
instance : AddLeftReflectLE NatOrdinal.{u} :=
⟨fun a b c h => by
by_contra! h'
exact h.not_lt (add_lt_add_left h' a)⟩
instance : AddCommMonoid NatOrdinal :=
{ add := (· + ·)
add_assoc := nadd_assoc
zero := 0
zero_add := zero_nadd
add_zero := nadd_zero
add_comm := nadd_comm
nsmul := nsmulRec }
instance : IsOrderedCancelAddMonoid NatOrdinal :=
{ add_le_add_left := fun _ _ => add_le_add_left
le_of_add_le_add_left := fun _ _ _ => le_of_add_le_add_left }
instance : AddMonoidWithOne NatOrdinal :=
AddMonoidWithOne.unary
@[simp]
theorem toOrdinal_natCast (n : ℕ) : toOrdinal n = n := by
induction' n with n hn
· rfl
· change (toOrdinal n) ♯ 1 = n + 1
rw [hn]; exact nadd_one n
instance : CharZero NatOrdinal where
cast_injective m n h := by
apply_fun toOrdinal at h
simpa using h
end NatOrdinal
open NatOrdinal
open NaturalOps
namespace Ordinal
theorem nadd_eq_add (a b : Ordinal) : a ♯ b = toOrdinal (toNatOrdinal a + toNatOrdinal b) :=
rfl
@[simp]
theorem toNatOrdinal_natCast (n : ℕ) : toNatOrdinal n = n := by
rw [← toOrdinal_natCast n]
rfl
theorem lt_of_nadd_lt_nadd_left : ∀ {a b c}, a ♯ b < a ♯ c → b < c :=
@lt_of_add_lt_add_left NatOrdinal _ _ _
theorem lt_of_nadd_lt_nadd_right : ∀ {a b c}, b ♯ a < c ♯ a → b < c :=
@lt_of_add_lt_add_right NatOrdinal _ _ _
theorem le_of_nadd_le_nadd_left : ∀ {a b c}, a ♯ b ≤ a ♯ c → b ≤ c :=
@le_of_add_le_add_left NatOrdinal _ _ _
theorem le_of_nadd_le_nadd_right : ∀ {a b c}, b ♯ a ≤ c ♯ a → b ≤ c :=
@le_of_add_le_add_right NatOrdinal _ _ _
@[simp]
theorem nadd_lt_nadd_iff_left : ∀ (a) {b c}, a ♯ b < a ♯ c ↔ b < c :=
@add_lt_add_iff_left NatOrdinal _ _ _ _
@[simp]
theorem nadd_lt_nadd_iff_right : ∀ (a) {b c}, b ♯ a < c ♯ a ↔ b < c :=
@add_lt_add_iff_right NatOrdinal _ _ _ _
@[simp]
theorem nadd_le_nadd_iff_left : ∀ (a) {b c}, a ♯ b ≤ a ♯ c ↔ b ≤ c :=
@add_le_add_iff_left NatOrdinal _ _ _ _
@[simp]
theorem nadd_le_nadd_iff_right : ∀ (a) {b c}, b ♯ a ≤ c ♯ a ↔ b ≤ c :=
@_root_.add_le_add_iff_right NatOrdinal _ _ _ _
theorem nadd_le_nadd : ∀ {a b c d}, a ≤ b → c ≤ d → a ♯ c ≤ b ♯ d :=
@add_le_add NatOrdinal _ _ _ _
theorem nadd_lt_nadd : ∀ {a b c d}, a < b → c < d → a ♯ c < b ♯ d :=
@add_lt_add NatOrdinal _ _ _ _
theorem nadd_lt_nadd_of_lt_of_le : ∀ {a b c d}, a < b → c ≤ d → a ♯ c < b ♯ d :=
@add_lt_add_of_lt_of_le NatOrdinal _ _ _ _
theorem nadd_lt_nadd_of_le_of_lt : ∀ {a b c d}, a ≤ b → c < d → a ♯ c < b ♯ d :=
@add_lt_add_of_le_of_lt NatOrdinal _ _ _ _
theorem nadd_left_cancel : ∀ {a b c}, a ♯ b = a ♯ c → b = c :=
@_root_.add_left_cancel NatOrdinal _ _
theorem nadd_right_cancel : ∀ {a b c}, a ♯ b = c ♯ b → a = c :=
@_root_.add_right_cancel NatOrdinal _ _
@[simp]
theorem nadd_left_cancel_iff : ∀ {a b c}, a ♯ b = a ♯ c ↔ b = c :=
@add_left_cancel_iff NatOrdinal _ _
@[simp]
theorem nadd_right_cancel_iff : ∀ {a b c}, b ♯ a = c ♯ a ↔ b = c :=
@add_right_cancel_iff NatOrdinal _ _
theorem le_nadd_self {a b} : a ≤ b ♯ a := by simpa using nadd_le_nadd_right (Ordinal.zero_le b) a
theorem le_nadd_left {a b c} (h : a ≤ c) : a ≤ b ♯ c :=
le_nadd_self.trans (nadd_le_nadd_left h b)
theorem le_self_nadd {a b} : a ≤ a ♯ b := by simpa using nadd_le_nadd_left (Ordinal.zero_le b) a
theorem le_nadd_right {a b c} (h : a ≤ b) : a ≤ b ♯ c :=
le_self_nadd.trans (nadd_le_nadd_right h c)
theorem nadd_left_comm : ∀ a b c, a ♯ (b ♯ c) = b ♯ (a ♯ c) :=
@add_left_comm NatOrdinal _
theorem nadd_right_comm : ∀ a b c, a ♯ b ♯ c = a ♯ c ♯ b :=
@add_right_comm NatOrdinal _
/-! ### Natural multiplication -/
variable {a b c d : Ordinal.{u}}
@[deprecated "avoid using the definition of `nmul` directly" (since := "2024-11-19")]
theorem nmul_def (a b : Ordinal) :
a ⨳ b = sInf {c | ∀ a' < a, ∀ b' < b, a' ⨳ b ♯ a ⨳ b' < c ♯ a' ⨳ b'} := by
rw [nmul]
/-- The set in the definition of `nmul` is nonempty. -/
private theorem nmul_nonempty (a b : Ordinal.{u}) :
{c : Ordinal.{u} | ∀ a' < a, ∀ b' < b, a' ⨳ b ♯ a ⨳ b' < c ♯ a' ⨳ b'}.Nonempty := by
obtain ⟨c, hc⟩ : BddAbove ((fun x ↦ x.1 ⨳ b ♯ a ⨳ x.2) '' Set.Iio a ×ˢ Set.Iio b) :=
bddAbove_of_small _
exact ⟨_, fun x hx y hy ↦
(lt_succ_of_le <| hc <| Set.mem_image_of_mem _ <| Set.mk_mem_prod hx hy).trans_le le_self_nadd⟩
theorem nmul_nadd_lt {a' b' : Ordinal} (ha : a' < a) (hb : b' < b) :
a' ⨳ b ♯ a ⨳ b' < a ⨳ b ♯ a' ⨳ b' := by
conv_rhs => rw [nmul]
exact csInf_mem (nmul_nonempty a b) a' ha b' hb
theorem nmul_nadd_le {a' b' : Ordinal} (ha : a' ≤ a) (hb : b' ≤ b) :
a' ⨳ b ♯ a ⨳ b' ≤ a ⨳ b ♯ a' ⨳ b' := by
rcases lt_or_eq_of_le ha with (ha | rfl)
· rcases lt_or_eq_of_le hb with (hb | rfl)
· exact (nmul_nadd_lt ha hb).le
· rw [nadd_comm]
· exact le_rfl
theorem lt_nmul_iff : c < a ⨳ b ↔ ∃ a' < a, ∃ b' < b, c ♯ a' ⨳ b' ≤ a' ⨳ b ♯ a ⨳ b' := by
refine ⟨fun h => ?_, ?_⟩
· rw [nmul] at h
simpa using not_mem_of_lt_csInf h ⟨0, fun _ _ => bot_le⟩
· rintro ⟨a', ha, b', hb, h⟩
have := h.trans_lt (nmul_nadd_lt ha hb)
rwa [nadd_lt_nadd_iff_right] at this
theorem nmul_le_iff : a ⨳ b ≤ c ↔ ∀ a' < a, ∀ b' < b, a' ⨳ b ♯ a ⨳ b' < c ♯ a' ⨳ b' := by
rw [← not_iff_not]; simp [lt_nmul_iff]
theorem nmul_comm (a b) : a ⨳ b = b ⨳ a := by
rw [nmul, nmul]
congr; ext x; constructor <;> intro H c hc d hd
· rw [nadd_comm, ← nmul_comm, ← nmul_comm a, ← nmul_comm d]
exact H _ hd _ hc
· rw [nadd_comm, nmul_comm, nmul_comm c, nmul_comm c]
exact H _ hd _ hc
termination_by (a, b)
@[simp]
theorem nmul_zero (a) : a ⨳ 0 = 0 := by
rw [← Ordinal.le_zero, nmul_le_iff]
exact fun _ _ a ha => (Ordinal.not_lt_zero a ha).elim
@[simp]
theorem zero_nmul (a) : 0 ⨳ a = 0 := by rw [nmul_comm, nmul_zero]
@[simp]
theorem nmul_one (a : Ordinal) : a ⨳ 1 = a := by
rw [nmul]
convert csInf_Ici
ext b
refine ⟨fun H ↦ le_of_forall_lt (a := a) fun c hc ↦ ?_, fun ha c hc ↦ ?_⟩
-- Porting note: had to add arguments to `nmul_one` in the next two lines
-- for the termination checker.
· simpa [nmul_one c] using H c hc
· simpa [nmul_one c] using hc.trans_le ha
termination_by a
@[simp]
theorem one_nmul (a) : 1 ⨳ a = a := by rw [nmul_comm, nmul_one]
theorem nmul_lt_nmul_of_pos_left (h₁ : a < b) (h₂ : 0 < c) : c ⨳ a < c ⨳ b :=
lt_nmul_iff.2 ⟨0, h₂, a, h₁, by simp⟩
theorem nmul_lt_nmul_of_pos_right (h₁ : a < b) (h₂ : 0 < c) : a ⨳ c < b ⨳ c :=
lt_nmul_iff.2 ⟨a, h₁, 0, h₂, by simp⟩
theorem nmul_le_nmul_left (h : a ≤ b) (c) : c ⨳ a ≤ c ⨳ b := by
rcases lt_or_eq_of_le h with (h₁ | rfl) <;> rcases (eq_zero_or_pos c).symm with (h₂ | rfl)
· exact (nmul_lt_nmul_of_pos_left h₁ h₂).le
all_goals simp
theorem nmul_le_nmul_right (h : a ≤ b) (c) : a ⨳ c ≤ b ⨳ c := by
rw [nmul_comm, nmul_comm b]
exact nmul_le_nmul_left h c
theorem nmul_nadd (a b c : Ordinal) : a ⨳ (b ♯ c) = a ⨳ b ♯ a ⨳ c := by
refine le_antisymm (nmul_le_iff.2 fun a' ha d hd => ?_)
(nadd_le_iff.2 ⟨fun d hd => ?_, fun d hd => ?_⟩)
· rw [nmul_nadd]
rcases lt_nadd_iff.1 hd with (⟨b', hb, hd⟩ | ⟨c', hc, hd⟩)
· have := nadd_lt_nadd_of_lt_of_le (nmul_nadd_lt ha hb) (nmul_nadd_le ha.le hd)
rw [nmul_nadd, nmul_nadd] at this
simp only [nadd_assoc] at this
rwa [nadd_left_comm, nadd_left_comm _ (a ⨳ b'), nadd_left_comm (a ⨳ b),
nadd_lt_nadd_iff_left, nadd_left_comm (a' ⨳ b), nadd_left_comm (a ⨳ b),
nadd_lt_nadd_iff_left, ← nadd_assoc, ← nadd_assoc] at this
· have := nadd_lt_nadd_of_le_of_lt (nmul_nadd_le ha.le hd) (nmul_nadd_lt ha hc)
rw [nmul_nadd, nmul_nadd] at this
simp only [nadd_assoc] at this
rwa [nadd_left_comm, nadd_comm (a ⨳ c), nadd_left_comm (a' ⨳ d), nadd_left_comm (a ⨳ c'),
nadd_left_comm (a ⨳ b), nadd_lt_nadd_iff_left, nadd_comm (a' ⨳ c), nadd_left_comm (a ⨳ d),
nadd_left_comm (a' ⨳ b), nadd_left_comm (a ⨳ b), nadd_lt_nadd_iff_left, nadd_comm (a ⨳ d),
nadd_comm (a' ⨳ d), ← nadd_assoc, ← nadd_assoc] at this
· rcases lt_nmul_iff.1 hd with ⟨a', ha, b', hb, hd⟩
have := nadd_lt_nadd_of_le_of_lt hd (nmul_nadd_lt ha (nadd_lt_nadd_right hb c))
rw [nmul_nadd, nmul_nadd, nmul_nadd a'] at this
simp only [nadd_assoc] at this
rwa [nadd_left_comm (a' ⨳ b'), nadd_left_comm, nadd_lt_nadd_iff_left, nadd_left_comm,
nadd_left_comm _ (a' ⨳ b'), nadd_left_comm (a ⨳ b'), nadd_lt_nadd_iff_left,
nadd_left_comm (a' ⨳ c), nadd_left_comm, nadd_lt_nadd_iff_left, nadd_left_comm,
nadd_comm _ (a' ⨳ c), nadd_lt_nadd_iff_left] at this
· rcases lt_nmul_iff.1 hd with ⟨a', ha, c', hc, hd⟩
have := nadd_lt_nadd_of_lt_of_le (nmul_nadd_lt ha (nadd_lt_nadd_left hc b)) hd
rw [nmul_nadd, nmul_nadd, nmul_nadd a'] at this
simp only [nadd_assoc] at this
rwa [nadd_left_comm _ (a' ⨳ b), nadd_lt_nadd_iff_left, nadd_left_comm (a' ⨳ c'),
nadd_left_comm _ (a' ⨳ c), nadd_lt_nadd_iff_left, nadd_left_comm, nadd_comm (a' ⨳ c'),
nadd_left_comm _ (a ⨳ c'), nadd_lt_nadd_iff_left, nadd_comm _ (a' ⨳ c'),
nadd_comm _ (a' ⨳ c'), nadd_left_comm, nadd_lt_nadd_iff_left] at this
termination_by (a, b, c)
theorem nadd_nmul (a b c) : (a ♯ b) ⨳ c = a ⨳ c ♯ b ⨳ c := by
rw [nmul_comm, nmul_nadd, nmul_comm, nmul_comm c]
theorem nmul_nadd_lt₃ {a' b' c' : Ordinal} (ha : a' < a) (hb : b' < b) (hc : c' < c) :
a' ⨳ b ⨳ c ♯ a ⨳ b' ⨳ c ♯ a ⨳ b ⨳ c' ♯ a' ⨳ b' ⨳ c' <
a ⨳ b ⨳ c ♯ a' ⨳ b' ⨳ c ♯ a' ⨳ b ⨳ c' ♯ a ⨳ b' ⨳ c' := by
simpa only [nadd_nmul, ← nadd_assoc] using nmul_nadd_lt (nmul_nadd_lt ha hb) hc
theorem nmul_nadd_le₃ {a' b' c' : Ordinal} (ha : a' ≤ a) (hb : b' ≤ b) (hc : c' ≤ c) :
a' ⨳ b ⨳ c ♯ a ⨳ b' ⨳ c ♯ a ⨳ b ⨳ c' ♯ a' ⨳ b' ⨳ c' ≤
a ⨳ b ⨳ c ♯ a' ⨳ b' ⨳ c ♯ a' ⨳ b ⨳ c' ♯ a ⨳ b' ⨳ c' := by
simpa only [nadd_nmul, ← nadd_assoc] using nmul_nadd_le (nmul_nadd_le ha hb) hc
private theorem nmul_nadd_lt₃' {a' b' c' : Ordinal} (ha : a' < a) (hb : b' < b) (hc : c' < c) :
a' ⨳ (b ⨳ c) ♯ a ⨳ (b' ⨳ c) ♯ a ⨳ (b ⨳ c') ♯ a' ⨳ (b' ⨳ c') <
a ⨳ (b ⨳ c) ♯ a' ⨳ (b' ⨳ c) ♯ a' ⨳ (b ⨳ c') ♯ a ⨳ (b' ⨳ c') := by
simp only [nmul_comm _ (_ ⨳ _)]
convert nmul_nadd_lt₃ hb hc ha using 1 <;>
(simp only [nadd_eq_add, NatOrdinal.toOrdinal_toNatOrdinal]; abel_nf)
@[deprecated nmul_nadd_le₃ (since := "2024-11-19")]
theorem nmul_nadd_le₃' {a' b' c' : Ordinal} (ha : a' ≤ a) (hb : b' ≤ b) (hc : c' ≤ c) :
a' ⨳ (b ⨳ c) ♯ a ⨳ (b' ⨳ c) ♯ a ⨳ (b ⨳ c') ♯ a' ⨳ (b' ⨳ c') ≤
a ⨳ (b ⨳ c) ♯ a' ⨳ (b' ⨳ c) ♯ a' ⨳ (b ⨳ c') ♯ a ⨳ (b' ⨳ c') := by
simp only [nmul_comm _ (_ ⨳ _)]
convert nmul_nadd_le₃ hb hc ha using 1 <;>
(simp only [nadd_eq_add, NatOrdinal.toOrdinal_toNatOrdinal]; abel_nf)
theorem lt_nmul_iff₃ : d < a ⨳ b ⨳ c ↔ ∃ a' < a, ∃ b' < b, ∃ c' < c,
d ♯ a' ⨳ b' ⨳ c ♯ a' ⨳ b ⨳ c' ♯ a ⨳ b' ⨳ c' ≤
a' ⨳ b ⨳ c ♯ a ⨳ b' ⨳ c ♯ a ⨳ b ⨳ c' ♯ a' ⨳ b' ⨳ c' := by
refine ⟨fun h ↦ ?_, fun ⟨a', ha, b', hb, c', hc, h⟩ ↦ ?_⟩
· rcases lt_nmul_iff.1 h with ⟨e, he, c', hc, H₁⟩
rcases lt_nmul_iff.1 he with ⟨a', ha, b', hb, H₂⟩
refine ⟨a', ha, b', hb, c', hc, ?_⟩
have := nadd_le_nadd H₁ (nmul_nadd_le H₂ hc.le)
simp only [nadd_nmul, nadd_assoc] at this
rw [nadd_left_comm, nadd_left_comm d, nadd_left_comm, nadd_le_nadd_iff_left,
nadd_left_comm (a ⨳ b' ⨳ c), nadd_left_comm (a' ⨳ b ⨳ c), nadd_left_comm (a ⨳ b ⨳ c'),
nadd_le_nadd_iff_left, nadd_left_comm (a ⨳ b ⨳ c'), nadd_left_comm (a ⨳ b ⨳ c')] at this
simpa only [nadd_assoc]
· have := h.trans_lt (nmul_nadd_lt₃ ha hb hc)
repeat rw [nadd_lt_nadd_iff_right] at this
assumption
theorem nmul_le_iff₃ : a ⨳ b ⨳ c ≤ d ↔ ∀ a' < a, ∀ b' < b, ∀ c' < c,
a' ⨳ b ⨳ c ♯ a ⨳ b' ⨳ c ♯ a ⨳ b ⨳ c' ♯ a' ⨳ b' ⨳ c' <
d ♯ a' ⨳ b' ⨳ c ♯ a' ⨳ b ⨳ c' ♯ a ⨳ b' ⨳ c' := by
simpa using lt_nmul_iff₃.not
private theorem nmul_le_iff₃' : a ⨳ (b ⨳ c) ≤ d ↔ ∀ a' < a, ∀ b' < b, ∀ c' < c,
a' ⨳ (b ⨳ c) ♯ a ⨳ (b' ⨳ c) ♯ a ⨳ (b ⨳ c') ♯ a' ⨳ (b' ⨳ c') <
d ♯ a' ⨳ (b' ⨳ c) ♯ a' ⨳ (b ⨳ c') ♯ a ⨳ (b' ⨳ c') := by
simp only [nmul_comm _ (_ ⨳ _), nmul_le_iff₃, nadd_eq_add, toOrdinal_toNatOrdinal]
constructor <;> intro h a' ha b' hb c' hc
· convert h b' hb c' hc a' ha using 1 <;> abel_nf
· convert h c' hc a' ha b' hb using 1 <;> abel_nf
@[deprecated lt_nmul_iff₃ (since := "2024-11-19")]
theorem lt_nmul_iff₃' : d < a ⨳ (b ⨳ c) ↔ ∃ a' < a, ∃ b' < b, ∃ c' < c,
d ♯ a' ⨳ (b' ⨳ c) ♯ a' ⨳ (b ⨳ c') ♯ a ⨳ (b' ⨳ c') ≤
a' ⨳ (b ⨳ c) ♯ a ⨳ (b' ⨳ c) ♯ a ⨳ (b ⨳ c') ♯ a' ⨳ (b' ⨳ c') := by
simpa using nmul_le_iff₃'.not
theorem nmul_assoc (a b c : Ordinal) : a ⨳ b ⨳ c = a ⨳ (b ⨳ c) := by
apply le_antisymm
· rw [nmul_le_iff₃]
intro a' ha b' hb c' hc
repeat rw [nmul_assoc]
exact nmul_nadd_lt₃' ha hb hc
· rw [nmul_le_iff₃']
intro a' ha b' hb c' hc
repeat rw [← nmul_assoc]
exact nmul_nadd_lt₃ ha hb hc
termination_by (a, b, c)
end Ordinal
namespace NatOrdinal
open Ordinal
instance : Mul NatOrdinal :=
⟨nmul⟩
theorem lt_mul_iff {a b c : NatOrdinal} :
c < a * b ↔ ∃ a' < a, ∃ b' < b, c + a' * b' ≤ a' * b + a * b' :=
Ordinal.lt_nmul_iff
theorem mul_le_iff {a b c : NatOrdinal} :
a * b ≤ c ↔ ∀ a' < a, ∀ b' < b, a' * b + a * b' < c + a' * b' :=
Ordinal.nmul_le_iff
theorem mul_add_lt {a b a' b' : NatOrdinal} (ha : a' < a) (hb : b' < b) :
a' * b + a * b' < a * b + a' * b' :=
Ordinal.nmul_nadd_lt ha hb
theorem nmul_nadd_le {a b a' b' : NatOrdinal} (ha : a' ≤ a) (hb : b' ≤ b) :
a' * b + a * b' ≤ a * b + a' * b' :=
Ordinal.nmul_nadd_le ha hb
|
instance : CommSemiring NatOrdinal :=
{ NatOrdinal.instAddCommMonoid with
mul := (· * ·)
left_distrib := nmul_nadd
right_distrib := nadd_nmul
zero_mul := zero_nmul
mul_zero := nmul_zero
mul_assoc := nmul_assoc
one := 1
one_mul := one_nmul
mul_one := nmul_one
mul_comm := nmul_comm }
instance : IsOrderedRing NatOrdinal :=
{ mul_le_mul_of_nonneg_left := fun _ _ c h _ => nmul_le_nmul_left h c
mul_le_mul_of_nonneg_right := fun _ _ c h _ => nmul_le_nmul_right h c }
end NatOrdinal
| Mathlib/SetTheory/Ordinal/NaturalOps.lean | 687 | 705 |
/-
Copyright (c) 2024 Brendan Murphy. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Brendan Murphy
-/
import Mathlib.RingTheory.Regular.IsSMulRegular
import Mathlib.RingTheory.Artinian.Module
import Mathlib.RingTheory.Nakayama
import Mathlib.Algebra.Equiv.TransferInstance
import Mathlib.RingTheory.LocalRing.MaximalIdeal.Basic
import Mathlib.RingTheory.Noetherian.Basic
/-!
# Regular sequences and weakly regular sequences
The notion of a regular sequence is fundamental in commutative algebra.
Properties of regular sequences encode information about singularities of a
ring and regularity of a sequence can be tested homologically.
However the notion of a regular sequence is only really sensible for Noetherian local rings.
TODO: Koszul regular sequences, H_1-regular sequences, quasi-regular sequences, depth.
## Tags
module, regular element, regular sequence, commutative algebra
-/
universe u v
open scoped Pointwise
variable {R S M M₂ M₃ M₄ : Type*}
namespace Ideal
variable [Semiring R] [Semiring S]
/-- The ideal generated by a list of elements. -/
abbrev ofList (rs : List R) := span { r | r ∈ rs }
@[simp] lemma ofList_nil : (ofList [] : Ideal R) = ⊥ :=
have : { r | r ∈ [] } = ∅ := Set.eq_empty_of_forall_not_mem (fun _ => List.not_mem_nil)
Eq.trans (congrArg span this) span_empty
@[simp] lemma ofList_append (rs₁ rs₂ : List R) :
ofList (rs₁ ++ rs₂) = ofList rs₁ ⊔ ofList rs₂ :=
have : { r | r ∈ rs₁ ++ rs₂ } = _ := Set.ext (fun _ => List.mem_append)
Eq.trans (congrArg span this) (span_union _ _)
lemma ofList_singleton (r : R) : ofList [r] = span {r} :=
congrArg span (Set.ext fun _ => List.mem_singleton)
@[simp] lemma ofList_cons (r : R) (rs : List R) :
ofList (r::rs) = span {r} ⊔ ofList rs :=
Eq.trans (ofList_append [r] rs) (congrArg (· ⊔ _) (ofList_singleton r))
@[simp] lemma map_ofList (f : R →+* S) (rs : List R) :
map f (ofList rs) = ofList (rs.map f) :=
Eq.trans (map_span f { r | r ∈ rs }) <| congrArg span <|
Set.ext (fun _ => List.mem_map.symm)
lemma ofList_cons_smul {R} [CommSemiring R] (r : R) (rs : List R) {M}
[AddCommMonoid M] [Module R M] (N : Submodule R M) :
ofList (r :: rs) • N = r • N ⊔ ofList rs • N := by
rw [ofList_cons, Submodule.sup_smul, Submodule.ideal_span_singleton_smul]
end Ideal
namespace Submodule
lemma smul_top_le_comap_smul_top [Semiring R] [AddCommMonoid M]
[AddCommMonoid M₂] [Module R M] [Module R M₂] (I : Ideal R)
(f : M →ₗ[R] M₂) : I • ⊤ ≤ comap f (I • ⊤) :=
map_le_iff_le_comap.mp <| le_of_eq_of_le (map_smul'' _ _ _) <|
smul_mono_right _ le_top
variable (M) [CommRing R] [AddCommGroup M] [AddCommGroup M₂]
[Module R M] [Module R M₂] (r : R) (rs : List R)
/-- The equivalence between M ⧸ (r₀, r₁, …, rₙ)M and (M ⧸ r₀M) ⧸ (r₁, …, rₙ) (M ⧸ r₀M). -/
def quotOfListConsSMulTopEquivQuotSMulTopInner :
(M ⧸ (Ideal.ofList (r :: rs) • ⊤ : Submodule R M)) ≃ₗ[R]
QuotSMulTop r M ⧸ (Ideal.ofList rs • ⊤ : Submodule R (QuotSMulTop r M)) :=
quotEquivOfEq _ _ (Ideal.ofList_cons_smul r rs ⊤) ≪≫ₗ
(quotientQuotientEquivQuotientSup (r • ⊤) (Ideal.ofList rs • ⊤)).symm ≪≫ₗ
quotEquivOfEq _ _ (by rw [map_smul'', map_top, range_mkQ])
/-- The equivalence between M ⧸ (r₀, r₁, …, rₙ)M and (M ⧸ (r₁, …, rₙ)) ⧸ r₀ (M ⧸ (r₁, …, rₙ)). -/
def quotOfListConsSMulTopEquivQuotSMulTopOuter :
(M ⧸ (Ideal.ofList (r :: rs) • ⊤ : Submodule R M)) ≃ₗ[R]
QuotSMulTop r (M ⧸ (Ideal.ofList rs • ⊤ : Submodule R M)) :=
quotEquivOfEq _ _ (Eq.trans (Ideal.ofList_cons_smul r rs ⊤) (sup_comm _ _)) ≪≫ₗ
(quotientQuotientEquivQuotientSup (Ideal.ofList rs • ⊤) (r • ⊤)).symm ≪≫ₗ
quotEquivOfEq _ _ (by rw [map_pointwise_smul, map_top, range_mkQ])
variable {M}
lemma quotOfListConsSMulTopEquivQuotSMulTopInner_naturality (f : M →ₗ[R] M₂) :
(quotOfListConsSMulTopEquivQuotSMulTopInner M₂ r rs).toLinearMap ∘ₗ
mapQ _ _ _ (smul_top_le_comap_smul_top (Ideal.ofList (r :: rs)) f) =
mapQ _ _ _ (smul_top_le_comap_smul_top _ (QuotSMulTop.map r f)) ∘ₗ
(quotOfListConsSMulTopEquivQuotSMulTopInner M r rs).toLinearMap :=
| quot_hom_ext _ _ _ fun _ => rfl
lemma top_eq_ofList_cons_smul_iff :
(⊤ : Submodule R M) = Ideal.ofList (r :: rs) • ⊤ ↔
(⊤ : Submodule R (QuotSMulTop r M)) = Ideal.ofList rs • ⊤ := by
| Mathlib/RingTheory/Regular/RegularSequence.lean | 103 | 107 |
/-
Copyright (c) 2014 Jeremy Avigad. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Jeremy Avigad, Leonardo de Moura
-/
import Mathlib.Data.Set.Operations
import Mathlib.Order.Basic
import Mathlib.Order.BooleanAlgebra
import Mathlib.Tactic.Tauto
import Mathlib.Tactic.ByContra
import Mathlib.Util.Delaborators
import Mathlib.Tactic.Lift
/-!
# Basic properties of sets
Sets in Lean are homogeneous; all their elements have the same type. Sets whose elements
have type `X` are thus defined as `Set X := X → Prop`. Note that this function need not
be decidable. The definition is in the module `Mathlib.Data.Set.Defs`.
This file provides some basic definitions related to sets and functions not present in the
definitions file, as well as extra lemmas for functions defined in the definitions file and
`Mathlib.Data.Set.Operations` (empty set, univ, union, intersection, insert, singleton,
set-theoretic difference, complement, and powerset).
Note that a set is a term, not a type. There is a coercion from `Set α` to `Type*` sending
`s` to the corresponding subtype `↥s`.
See also the file `SetTheory/ZFC.lean`, which contains an encoding of ZFC set theory in Lean.
## Main definitions
Notation used here:
- `f : α → β` is a function,
- `s : Set α` and `s₁ s₂ : Set α` are subsets of `α`
- `t : Set β` is a subset of `β`.
Definitions in the file:
* `Nonempty s : Prop` : the predicate `s ≠ ∅`. Note that this is the preferred way to express the
fact that `s` has an element (see the Implementation Notes).
* `inclusion s₁ s₂ : ↥s₁ → ↥s₂` : the map `↥s₁ → ↥s₂` induced by an inclusion `s₁ ⊆ s₂`.
## Notation
* `sᶜ` for the complement of `s`
## Implementation notes
* `s.Nonempty` is to be preferred to `s ≠ ∅` or `∃ x, x ∈ s`. It has the advantage that
the `s.Nonempty` dot notation can be used.
* For `s : Set α`, do not use `Subtype s`. Instead use `↥s` or `(s : Type*)` or `s`.
## Tags
set, sets, subset, subsets, union, intersection, insert, singleton, complement, powerset
-/
assert_not_exists RelIso
/-! ### Set coercion to a type -/
open Function
universe u v
namespace Set
variable {α : Type u} {s t : Set α}
instance instBooleanAlgebra : 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
@[simp]
theorem bot_eq_empty : (⊥ : Set α) = ∅ :=
rfl
@[simp]
theorem sup_eq_union : ((· ⊔ ·) : Set α → Set α → Set α) = (· ∪ ·) :=
rfl
@[simp]
theorem inf_eq_inter : ((· ⊓ ·) : Set α → Set α → Set α) = (· ∩ ·) :=
rfl
@[simp]
theorem le_eq_subset : ((· ≤ ·) : Set α → Set α → Prop) = (· ⊆ ·) :=
rfl
@[simp]
theorem lt_eq_ssubset : ((· < ·) : Set α → Set α → Prop) = (· ⊂ ·) :=
rfl
theorem le_iff_subset : s ≤ t ↔ s ⊆ t :=
Iff.rfl
theorem lt_iff_ssubset : s < t ↔ s ⊂ t :=
Iff.rfl
alias ⟨_root_.LE.le.subset, _root_.HasSubset.Subset.le⟩ := le_iff_subset
alias ⟨_root_.LT.lt.ssubset, _root_.HasSSubset.SSubset.lt⟩ := lt_iff_ssubset
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
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
end Set
section SetCoe
variable {α : Type u}
instance (s : Set α) : CoeTC s α := ⟨fun x => x.1⟩
theorem Set.coe_eq_subtype (s : Set α) : ↥s = { x // x ∈ s } :=
rfl
@[simp]
theorem Set.coe_setOf (p : α → Prop) : ↥{ x | p x } = { x // p x } :=
rfl
theorem SetCoe.forall {s : Set α} {p : s → Prop} : (∀ x : s, p x) ↔ ∀ (x) (h : x ∈ s), p ⟨x, h⟩ :=
Subtype.forall
theorem SetCoe.exists {s : Set α} {p : s → Prop} :
(∃ x : s, p x) ↔ ∃ (x : _) (h : x ∈ s), p ⟨x, h⟩ :=
Subtype.exists
theorem SetCoe.exists' {s : Set α} {p : ∀ x, x ∈ s → Prop} :
(∃ (x : _) (h : x ∈ s), p x h) ↔ ∃ x : s, p x.1 x.2 :=
(@SetCoe.exists _ _ fun x => p x.1 x.2).symm
theorem SetCoe.forall' {s : Set α} {p : ∀ x, x ∈ s → Prop} :
(∀ (x) (h : x ∈ s), p x h) ↔ ∀ x : s, p x.1 x.2 :=
(@SetCoe.forall _ _ fun x => p x.1 x.2).symm
@[simp]
theorem set_coe_cast :
∀ {s t : Set α} (H' : s = t) (H : ↥s = ↥t) (x : s), cast H x = ⟨x.1, H' ▸ x.2⟩
| _, _, rfl, _, _ => rfl
theorem SetCoe.ext {s : Set α} {a b : s} : (a : α) = b → a = b :=
Subtype.eq
theorem SetCoe.ext_iff {s : Set α} {a b : s} : (↑a : α) = ↑b ↔ a = b :=
Iff.intro SetCoe.ext fun h => h ▸ rfl
end SetCoe
/-- See also `Subtype.prop` -/
theorem Subtype.mem {α : Type*} {s : Set α} (p : s) : (p : α) ∈ s :=
p.prop
/-- Duplicate of `Eq.subset'`, which currently has elaboration problems. -/
theorem Eq.subset {α} {s t : Set α} : s = t → s ⊆ t :=
fun h₁ _ h₂ => by rw [← h₁]; exact h₂
namespace Set
variable {α : Type u} {β : Type v} {a b : α} {s s₁ s₂ t t₁ t₂ u : Set α}
instance : Inhabited (Set α) :=
⟨∅⟩
@[trans]
theorem mem_of_mem_of_subset {x : α} {s t : Set α} (hx : x ∈ s) (h : s ⊆ t) : x ∈ t :=
h hx
theorem forall_in_swap {p : α → β → Prop} : (∀ a ∈ s, ∀ (b), p a b) ↔ ∀ (b), ∀ a ∈ s, p a b := by
tauto
theorem setOf_injective : Function.Injective (@setOf α) := injective_id
theorem setOf_inj {p q : α → Prop} : { x | p x } = { x | q x } ↔ p = q := Iff.rfl
/-! ### Lemmas about `mem` and `setOf` -/
theorem mem_setOf {a : α} {p : α → Prop} : a ∈ { x | p x } ↔ p a :=
Iff.rfl
/-- This lemma is intended for use with `rw` where a membership predicate is needed,
hence the explicit argument and the equality in the reverse direction from normal.
See also `Set.mem_setOf_eq` for the reverse direction applied to an argument. -/
theorem eq_mem_setOf (p : α → Prop) : p = (· ∈ {a | p a}) := rfl
/-- If `h : a ∈ {x | p x}` then `h.out : p x`. These are definitionally equal, but this can
nevertheless be useful for various reasons, e.g. to apply further projection notation or in an
argument to `simp`. -/
theorem _root_.Membership.mem.out {p : α → Prop} {a : α} (h : a ∈ { x | p x }) : p a :=
h
theorem nmem_setOf_iff {a : α} {p : α → Prop} : a ∉ { x | p x } ↔ ¬p a :=
Iff.rfl
@[simp]
theorem setOf_mem_eq {s : Set α} : { x | x ∈ s } = s :=
rfl
theorem setOf_set {s : Set α} : setOf s = s :=
rfl
theorem setOf_app_iff {p : α → Prop} {x : α} : { x | p x } x ↔ p x :=
Iff.rfl
theorem mem_def {a : α} {s : Set α} : a ∈ s ↔ s a :=
Iff.rfl
theorem setOf_bijective : Bijective (setOf : (α → Prop) → Set α) :=
bijective_id
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
theorem setOf_and {p q : α → Prop} : { a | p a ∧ q a } = { a | p a } ∩ { a | q a } :=
rfl
theorem setOf_or {p q : α → Prop} : { a | p a ∨ q a } = { a | p a } ∪ { a | q a } :=
rfl
/-! ### Subset and strict subset relations -/
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
theorem ssubset_def : (s ⊂ t) = (s ⊆ t ∧ ¬t ⊆ s) :=
rfl
@[refl]
theorem Subset.refl (a : Set α) : a ⊆ a := fun _ => id
theorem Subset.rfl {s : Set α} : s ⊆ s :=
Subset.refl s
@[trans]
theorem Subset.trans {a b c : Set α} (ab : a ⊆ b) (bc : b ⊆ c) : a ⊆ c := fun _ h => bc <| ab h
@[trans]
theorem mem_of_eq_of_mem {x y : α} {s : Set α} (hx : x = y) (h : y ∈ s) : x ∈ s :=
hx.symm ▸ h
theorem Subset.antisymm {a b : Set α} (h₁ : a ⊆ b) (h₂ : b ⊆ a) : a = b :=
Set.ext fun _ => ⟨@h₁ _, @h₂ _⟩
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⟩
-- an alternative name
theorem eq_of_subset_of_subset {a b : Set α} : a ⊆ b → b ⊆ a → a = b :=
Subset.antisymm
theorem mem_of_subset_of_mem {s₁ s₂ : Set α} {a : α} (h : s₁ ⊆ s₂) : a ∈ s₁ → a ∈ s₂ :=
@h _
theorem not_mem_subset (h : s ⊆ t) : a ∉ t → a ∉ s :=
mt <| mem_of_subset_of_mem h
theorem not_subset : ¬s ⊆ t ↔ ∃ a ∈ s, a ∉ t := by
simp only [subset_def, not_forall, exists_prop]
theorem not_top_subset : ¬⊤ ⊆ s ↔ ∃ a, a ∉ s := by
simp [not_subset]
lemma eq_of_forall_subset_iff (h : ∀ u, s ⊆ u ↔ t ⊆ u) : s = t := eq_of_forall_ge_iff h
/-! ### Definition of strict subsets `s ⊂ t` and basic properties. -/
protected theorem eq_or_ssubset_of_subset (h : s ⊆ t) : s = t ∨ s ⊂ t :=
eq_or_lt_of_le h
theorem exists_of_ssubset {s t : Set α} (h : s ⊂ t) : ∃ x ∈ t, x ∉ s :=
not_subset.1 h.2
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
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⟩⟩
theorem ssubset_iff_exists {s t : Set α} : s ⊂ t ↔ s ⊆ t ∧ ∃ x ∈ t, x ∉ s :=
⟨fun h ↦ ⟨h.le, Set.exists_of_ssubset h⟩, fun ⟨h1, h2⟩ ↦ (Set.ssubset_iff_of_subset h1).mpr h2⟩
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)⟩
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)⟩
theorem not_mem_empty (x : α) : ¬x ∈ (∅ : Set α) :=
id
theorem not_not_mem : ¬a ∉ s ↔ a ∈ s :=
not_not
/-! ### Non-empty sets -/
theorem nonempty_coe_sort {s : Set α} : Nonempty ↥s ↔ s.Nonempty :=
nonempty_subtype
alias ⟨_, Nonempty.coe_sort⟩ := nonempty_coe_sort
theorem nonempty_def : s.Nonempty ↔ ∃ x, x ∈ s :=
Iff.rfl
theorem nonempty_of_mem {x} (h : x ∈ s) : s.Nonempty :=
⟨x, h⟩
theorem Nonempty.not_subset_empty : s.Nonempty → ¬s ⊆ ∅
| ⟨_, hx⟩, hs => hs hx
/-- Extract a witness from `s.Nonempty`. This function might be used instead of case analysis
on the argument. Note that it makes a proof depend on the `Classical.choice` axiom. -/
protected noncomputable def Nonempty.some (h : s.Nonempty) : α :=
Classical.choose h
protected theorem Nonempty.some_mem (h : s.Nonempty) : h.some ∈ s :=
Classical.choose_spec h
theorem Nonempty.mono (ht : s ⊆ t) (hs : s.Nonempty) : t.Nonempty :=
hs.imp ht
theorem nonempty_of_not_subset (h : ¬s ⊆ t) : (s \ t).Nonempty :=
let ⟨x, xs, xt⟩ := not_subset.1 h
⟨x, xs, xt⟩
theorem nonempty_of_ssubset (ht : s ⊂ t) : (t \ s).Nonempty :=
nonempty_of_not_subset ht.2
theorem Nonempty.of_diff (h : (s \ t).Nonempty) : s.Nonempty :=
h.imp fun _ => And.left
theorem nonempty_of_ssubset' (ht : s ⊂ t) : t.Nonempty :=
(nonempty_of_ssubset ht).of_diff
theorem Nonempty.inl (hs : s.Nonempty) : (s ∪ t).Nonempty :=
hs.imp fun _ => Or.inl
theorem Nonempty.inr (ht : t.Nonempty) : (s ∪ t).Nonempty :=
ht.imp fun _ => Or.inr
@[simp]
theorem union_nonempty : (s ∪ t).Nonempty ↔ s.Nonempty ∨ t.Nonempty :=
exists_or
theorem Nonempty.left (h : (s ∩ t).Nonempty) : s.Nonempty :=
h.imp fun _ => And.left
theorem Nonempty.right (h : (s ∩ t).Nonempty) : t.Nonempty :=
h.imp fun _ => And.right
theorem inter_nonempty : (s ∩ t).Nonempty ↔ ∃ x, x ∈ s ∧ x ∈ t :=
Iff.rfl
theorem inter_nonempty_iff_exists_left : (s ∩ t).Nonempty ↔ ∃ x ∈ s, x ∈ t := by
simp_rw [inter_nonempty]
theorem inter_nonempty_iff_exists_right : (s ∩ t).Nonempty ↔ ∃ x ∈ t, x ∈ s := by
simp_rw [inter_nonempty, and_comm]
theorem nonempty_iff_univ_nonempty : Nonempty α ↔ (univ : Set α).Nonempty :=
⟨fun ⟨x⟩ => ⟨x, trivial⟩, fun ⟨x, _⟩ => ⟨x⟩⟩
@[simp]
theorem univ_nonempty : ∀ [Nonempty α], (univ : Set α).Nonempty
| ⟨x⟩ => ⟨x, trivial⟩
theorem Nonempty.to_subtype : s.Nonempty → Nonempty (↥s) :=
nonempty_subtype.2
theorem Nonempty.to_type : s.Nonempty → Nonempty α := fun ⟨x, _⟩ => ⟨x⟩
instance univ.nonempty [Nonempty α] : Nonempty (↥(Set.univ : Set α)) :=
Set.univ_nonempty.to_subtype
-- Redeclare for refined keys
-- `Nonempty (@Subtype _ (@Membership.mem _ (Set _) _ (@Top.top (Set _) _)))`
instance instNonemptyTop [Nonempty α] : Nonempty (⊤ : Set α) :=
inferInstanceAs (Nonempty (univ : Set α))
theorem Nonempty.of_subtype [Nonempty (↥s)] : s.Nonempty := nonempty_subtype.mp ‹_›
@[deprecated (since := "2024-11-23")] alias nonempty_of_nonempty_subtype := Nonempty.of_subtype
/-! ### Lemmas about the empty set -/
theorem empty_def : (∅ : Set α) = { _x : α | False } :=
rfl
@[simp]
theorem mem_empty_iff_false (x : α) : x ∈ (∅ : Set α) ↔ False :=
Iff.rfl
@[simp]
theorem setOf_false : { _a : α | False } = ∅ :=
rfl
@[simp] theorem setOf_bot : { _x : α | ⊥ } = ∅ := rfl
@[simp]
theorem empty_subset (s : Set α) : ∅ ⊆ s :=
nofun
@[simp]
theorem subset_empty_iff {s : Set α} : s ⊆ ∅ ↔ s = ∅ :=
(Subset.antisymm_iff.trans <| and_iff_left (empty_subset _)).symm
theorem eq_empty_iff_forall_not_mem {s : Set α} : s = ∅ ↔ ∀ x, x ∉ s :=
subset_empty_iff.symm
theorem eq_empty_of_forall_not_mem (h : ∀ x, x ∉ s) : s = ∅ :=
subset_empty_iff.1 h
theorem eq_empty_of_subset_empty {s : Set α} : s ⊆ ∅ → s = ∅ :=
subset_empty_iff.1
theorem eq_empty_of_isEmpty [IsEmpty α] (s : Set α) : s = ∅ :=
eq_empty_of_subset_empty fun x _ => isEmptyElim x
/-- There is exactly one set of a type that is empty. -/
instance uniqueEmpty [IsEmpty α] : Unique (Set α) where
default := ∅
uniq := eq_empty_of_isEmpty
/-- See also `Set.nonempty_iff_ne_empty`. -/
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]
/-- See also `Set.not_nonempty_iff_eq_empty`. -/
theorem nonempty_iff_ne_empty : s.Nonempty ↔ s ≠ ∅ :=
not_nonempty_iff_eq_empty.not_right
/-- See also `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]
/-- See also `not_nonempty_iff_eq_empty'`. -/
theorem nonempty_iff_ne_empty' : Nonempty s ↔ s ≠ ∅ :=
not_nonempty_iff_eq_empty'.not_right
alias ⟨Nonempty.ne_empty, _⟩ := nonempty_iff_ne_empty
@[simp]
theorem not_nonempty_empty : ¬(∅ : Set α).Nonempty := fun ⟨_, hx⟩ => hx
@[simp]
theorem isEmpty_coe_sort {s : Set α} : IsEmpty (↥s) ↔ s = ∅ :=
not_iff_not.1 <| by simpa using nonempty_iff_ne_empty
theorem eq_empty_or_nonempty (s : Set α) : s = ∅ ∨ s.Nonempty :=
or_iff_not_imp_left.2 nonempty_iff_ne_empty.2
theorem subset_eq_empty {s t : Set α} (h : t ⊆ s) (e : s = ∅) : t = ∅ :=
subset_empty_iff.1 <| e ▸ h
theorem forall_mem_empty {p : α → Prop} : (∀ x ∈ (∅ : Set α), p x) ↔ True :=
iff_true_intro fun _ => False.elim
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
alias ⟨_, Nonempty.empty_ssubset⟩ := empty_ssubset
/-!
### Universal set.
In Lean `@univ α` (or `univ : Set α`) is the set that contains all elements of type `α`.
Mathematically it is the same as `α` but it has a different type.
-/
@[simp]
theorem setOf_true : { _x : α | True } = univ :=
rfl
@[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⟩
theorem empty_ne_univ [Nonempty α] : (∅ : Set α) ≠ univ := fun e =>
not_isEmpty_of_nonempty α <| univ_eq_empty_iff.1 e.symm
@[simp]
theorem subset_univ (s : Set α) : s ⊆ univ := fun _ _ => trivial
@[simp]
theorem univ_subset_iff {s : Set α} : univ ⊆ s ↔ s = univ :=
@top_le_iff _ _ _ s
alias ⟨eq_univ_of_univ_subset, _⟩ := univ_subset_iff
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
theorem eq_univ_of_forall {s : Set α} : (∀ x, x ∈ s) → s = univ :=
eq_univ_iff_forall.2
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]
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)
theorem exists_mem_of_nonempty (α) : ∀ [Nonempty α], ∃ x : α, x ∈ (univ : Set α)
| ⟨x⟩ => ⟨x, trivial⟩
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]
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]
theorem univ_unique [Unique α] : @Set.univ α = {default} :=
Set.ext fun x => iff_of_true trivial <| Subsingleton.elim x default
theorem ssubset_univ_iff : s ⊂ univ ↔ s ≠ univ :=
lt_top_iff_ne_top
instance nontrivial_of_nonempty [Nonempty α] : Nontrivial (Set α) :=
⟨⟨∅, univ, empty_ne_univ⟩⟩
/-! ### Lemmas about union -/
theorem union_def {s₁ s₂ : Set α} : s₁ ∪ s₂ = { a | a ∈ s₁ ∨ a ∈ s₂ } :=
rfl
theorem mem_union_left {x : α} {a : Set α} (b : Set α) : x ∈ a → x ∈ a ∪ b :=
Or.inl
theorem mem_union_right {x : α} {b : Set α} (a : Set α) : x ∈ b → x ∈ a ∪ b :=
Or.inr
theorem mem_or_mem_of_mem_union {x : α} {a b : Set α} (H : x ∈ a ∪ b) : x ∈ a ∨ x ∈ b :=
H
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
@[simp]
theorem mem_union (x : α) (a b : Set α) : x ∈ a ∪ b ↔ x ∈ a ∨ x ∈ b :=
Iff.rfl
@[simp]
theorem union_self (a : Set α) : a ∪ a = a :=
ext fun _ => or_self_iff
@[simp]
theorem union_empty (a : Set α) : a ∪ ∅ = a :=
ext fun _ => iff_of_eq (or_false _)
@[simp]
theorem empty_union (a : Set α) : ∅ ∪ a = a :=
ext fun _ => iff_of_eq (false_or _)
theorem union_comm (a b : Set α) : a ∪ b = b ∪ a :=
ext fun _ => or_comm
theorem union_assoc (a b c : Set α) : a ∪ b ∪ c = a ∪ (b ∪ c) :=
ext fun _ => or_assoc
instance union_isAssoc : Std.Associative (α := Set α) (· ∪ ·) :=
⟨union_assoc⟩
instance union_isComm : Std.Commutative (α := Set α) (· ∪ ·) :=
⟨union_comm⟩
theorem union_left_comm (s₁ s₂ s₃ : Set α) : s₁ ∪ (s₂ ∪ s₃) = s₂ ∪ (s₁ ∪ s₃) :=
ext fun _ => or_left_comm
theorem union_right_comm (s₁ s₂ s₃ : Set α) : s₁ ∪ s₂ ∪ s₃ = s₁ ∪ s₃ ∪ s₂ :=
ext fun _ => or_right_comm
@[simp]
theorem union_eq_left {s t : Set α} : s ∪ t = s ↔ t ⊆ s :=
sup_eq_left
@[simp]
theorem union_eq_right {s t : Set α} : s ∪ t = t ↔ s ⊆ t :=
sup_eq_right
theorem union_eq_self_of_subset_left {s t : Set α} (h : s ⊆ t) : s ∪ t = t :=
union_eq_right.mpr h
theorem union_eq_self_of_subset_right {s t : Set α} (h : t ⊆ s) : s ∪ t = s :=
union_eq_left.mpr h
@[simp]
theorem subset_union_left {s t : Set α} : s ⊆ s ∪ t := fun _ => Or.inl
@[simp]
theorem subset_union_right {s t : Set α} : t ⊆ s ∪ t := fun _ => Or.inr
theorem union_subset {s t r : Set α} (sr : s ⊆ r) (tr : t ⊆ r) : s ∪ t ⊆ r := fun _ =>
Or.rec (@sr _) (@tr _)
@[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
@[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 _)
@[gcongr]
theorem union_subset_union_left {s₁ s₂ : Set α} (t) (h : s₁ ⊆ s₂) : s₁ ∪ t ⊆ s₂ ∪ t :=
union_subset_union h Subset.rfl
@[gcongr]
theorem union_subset_union_right (s) {t₁ t₂ : Set α} (h : t₁ ⊆ t₂) : s ∪ t₁ ⊆ s ∪ t₂ :=
union_subset_union Subset.rfl h
theorem subset_union_of_subset_left {s t : Set α} (h : s ⊆ t) (u : Set α) : s ⊆ t ∪ u :=
h.trans subset_union_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
theorem union_congr_left (ht : t ⊆ s ∪ u) (hu : u ⊆ s ∪ t) : s ∪ t = s ∪ u :=
sup_congr_left ht hu
theorem union_congr_right (hs : s ⊆ t ∪ u) (ht : t ⊆ s ∪ u) : s ∪ u = t ∪ u :=
sup_congr_right hs ht
theorem union_eq_union_iff_left : s ∪ t = s ∪ u ↔ t ⊆ s ∪ u ∧ u ⊆ s ∪ t :=
sup_eq_sup_iff_left
theorem union_eq_union_iff_right : s ∪ u = t ∪ u ↔ s ⊆ t ∪ u ∧ t ⊆ s ∪ u :=
sup_eq_sup_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
@[simp]
theorem union_univ (s : Set α) : s ∪ univ = univ := sup_top_eq _
@[simp]
theorem univ_union (s : Set α) : univ ∪ s = univ := top_sup_eq _
@[simp]
theorem ssubset_union_left_iff : s ⊂ s ∪ t ↔ ¬ t ⊆ s :=
left_lt_sup
@[simp]
theorem ssubset_union_right_iff : t ⊂ s ∪ t ↔ ¬ s ⊆ t :=
right_lt_sup
/-! ### Lemmas about intersection -/
theorem inter_def {s₁ s₂ : Set α} : s₁ ∩ s₂ = { a | a ∈ s₁ ∧ a ∈ s₂ } :=
rfl
@[simp, mfld_simps]
theorem mem_inter_iff (x : α) (a b : Set α) : x ∈ a ∩ b ↔ x ∈ a ∧ x ∈ b :=
Iff.rfl
theorem mem_inter {x : α} {a b : Set α} (ha : x ∈ a) (hb : x ∈ b) : x ∈ a ∩ b :=
⟨ha, hb⟩
theorem mem_of_mem_inter_left {x : α} {a b : Set α} (h : x ∈ a ∩ b) : x ∈ a :=
h.left
theorem mem_of_mem_inter_right {x : α} {a b : Set α} (h : x ∈ a ∩ b) : x ∈ b :=
h.right
@[simp]
theorem inter_self (a : Set α) : a ∩ a = a :=
ext fun _ => and_self_iff
@[simp]
theorem inter_empty (a : Set α) : a ∩ ∅ = ∅ :=
ext fun _ => iff_of_eq (and_false _)
@[simp]
theorem empty_inter (a : Set α) : ∅ ∩ a = ∅ :=
ext fun _ => iff_of_eq (false_and _)
theorem inter_comm (a b : Set α) : a ∩ b = b ∩ a :=
ext fun _ => and_comm
theorem inter_assoc (a b c : Set α) : a ∩ b ∩ c = a ∩ (b ∩ c) :=
ext fun _ => and_assoc
instance inter_isAssoc : Std.Associative (α := Set α) (· ∩ ·) :=
⟨inter_assoc⟩
instance inter_isComm : Std.Commutative (α := Set α) (· ∩ ·) :=
⟨inter_comm⟩
theorem inter_left_comm (s₁ s₂ s₃ : Set α) : s₁ ∩ (s₂ ∩ s₃) = s₂ ∩ (s₁ ∩ s₃) :=
ext fun _ => and_left_comm
theorem inter_right_comm (s₁ s₂ s₃ : Set α) : s₁ ∩ s₂ ∩ s₃ = s₁ ∩ s₃ ∩ s₂ :=
ext fun _ => and_right_comm
@[simp, mfld_simps]
theorem inter_subset_left {s t : Set α} : s ∩ t ⊆ s := fun _ => And.left
@[simp]
theorem inter_subset_right {s t : Set α} : s ∩ t ⊆ t := fun _ => And.right
theorem subset_inter {s t r : Set α} (rs : r ⊆ s) (rt : r ⊆ t) : r ⊆ s ∩ t := fun _ h =>
⟨rs h, rt h⟩
@[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
@[simp] lemma inter_eq_left : s ∩ t = s ↔ s ⊆ t := inf_eq_left
@[simp] lemma inter_eq_right : s ∩ t = t ↔ t ⊆ s := inf_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
theorem inter_eq_self_of_subset_right {s t : Set α} : t ⊆ s → s ∩ t = t :=
inter_eq_right.mpr
theorem inter_congr_left (ht : s ∩ u ⊆ t) (hu : s ∩ t ⊆ u) : s ∩ t = s ∩ u :=
inf_congr_left ht hu
theorem inter_congr_right (hs : t ∩ u ⊆ s) (ht : s ∩ u ⊆ t) : s ∩ u = t ∩ u :=
inf_congr_right hs ht
theorem inter_eq_inter_iff_left : s ∩ t = s ∩ u ↔ s ∩ u ⊆ t ∧ s ∩ t ⊆ u :=
inf_eq_inf_iff_left
theorem inter_eq_inter_iff_right : s ∩ u = t ∩ u ↔ t ∩ u ⊆ s ∧ s ∩ u ⊆ t :=
inf_eq_inf_iff_right
@[simp, mfld_simps]
theorem inter_univ (a : Set α) : a ∩ univ = a := inf_top_eq _
@[simp, mfld_simps]
theorem univ_inter (a : Set α) : univ ∩ a = a := top_inf_eq _
@[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 _)
@[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
@[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
theorem union_inter_cancel_left {s t : Set α} : (s ∪ t) ∩ s = s :=
inter_eq_self_of_subset_right subset_union_left
theorem union_inter_cancel_right {s t : Set α} : (s ∪ t) ∩ t = t :=
inter_eq_self_of_subset_right subset_union_right
theorem inter_setOf_eq_sep (s : Set α) (p : α → Prop) : s ∩ {a | p a} = {a ∈ s | p a} :=
rfl
theorem setOf_inter_eq_sep (p : α → Prop) (s : Set α) : {a | p a} ∩ s = {a ∈ s | p a} :=
inter_comm _ _
@[simp]
theorem inter_ssubset_right_iff : s ∩ t ⊂ t ↔ ¬ t ⊆ s :=
inf_lt_right
@[simp]
theorem inter_ssubset_left_iff : s ∩ t ⊂ s ↔ ¬ s ⊆ t :=
inf_lt_left
/-! ### Distributivity laws -/
theorem inter_union_distrib_left (s t u : Set α) : s ∩ (t ∪ u) = s ∩ t ∪ s ∩ u :=
inf_sup_left _ _ _
theorem union_inter_distrib_right (s t u : Set α) : (s ∪ t) ∩ u = s ∩ u ∪ t ∩ u :=
inf_sup_right _ _ _
theorem union_inter_distrib_left (s t u : Set α) : s ∪ t ∩ u = (s ∪ t) ∩ (s ∪ u) :=
sup_inf_left _ _ _
theorem inter_union_distrib_right (s t u : Set α) : s ∩ t ∪ u = (s ∪ u) ∩ (t ∪ u) :=
sup_inf_right _ _ _
theorem union_union_distrib_left (s t u : Set α) : s ∪ (t ∪ u) = s ∪ t ∪ (s ∪ u) :=
sup_sup_distrib_left _ _ _
theorem union_union_distrib_right (s t u : Set α) : s ∪ t ∪ u = s ∪ u ∪ (t ∪ u) :=
sup_sup_distrib_right _ _ _
theorem inter_inter_distrib_left (s t u : Set α) : s ∩ (t ∩ u) = s ∩ t ∩ (s ∩ u) :=
inf_inf_distrib_left _ _ _
theorem inter_inter_distrib_right (s t u : Set α) : s ∩ t ∩ u = s ∩ u ∩ (t ∩ u) :=
inf_inf_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 _ _ _ _
theorem inter_inter_inter_comm (s t u v : Set α) : s ∩ t ∩ (u ∩ v) = s ∩ u ∩ (t ∩ v) :=
inf_inf_inf_comm _ _ _ _
/-! ### Lemmas about sets defined as `{x ∈ s | p x}`. -/
section Sep
variable {p q : α → Prop} {x : α}
theorem mem_sep (xs : x ∈ s) (px : p x) : x ∈ { x ∈ s | p x } :=
⟨xs, px⟩
@[simp]
theorem sep_mem_eq : { x ∈ s | x ∈ t } = s ∩ t :=
rfl
@[simp]
theorem mem_sep_iff : x ∈ { x ∈ s | p x } ↔ x ∈ s ∧ p x :=
Iff.rfl
theorem sep_ext_iff : { x ∈ s | p x } = { x ∈ s | q x } ↔ ∀ x ∈ s, p x ↔ q x := by
simp_rw [Set.ext_iff, mem_sep_iff, and_congr_right_iff]
theorem sep_eq_of_subset (h : s ⊆ t) : { x ∈ t | x ∈ s } = s :=
inter_eq_self_of_subset_right h
@[simp]
theorem sep_subset (s : Set α) (p : α → Prop) : { x ∈ s | p x } ⊆ s := fun _ => And.left
@[simp]
theorem sep_eq_self_iff_mem_true : { x ∈ s | p x } = s ↔ ∀ x ∈ s, p x := by
simp_rw [Set.ext_iff, mem_sep_iff, and_iff_left_iff_imp]
@[simp]
theorem sep_eq_empty_iff_mem_false : { x ∈ s | p x } = ∅ ↔ ∀ x ∈ s, ¬p x := by
simp_rw [Set.ext_iff, mem_sep_iff, mem_empty_iff_false, iff_false, not_and]
theorem sep_true : { x ∈ s | True } = s :=
inter_univ s
theorem sep_false : { x ∈ s | False } = ∅ :=
inter_empty s
theorem sep_empty (p : α → Prop) : { x ∈ (∅ : Set α) | p x } = ∅ :=
empty_inter {x | p x}
theorem sep_univ : { x ∈ (univ : Set α) | p x } = { x | p x } :=
univ_inter {x | p x}
@[simp]
theorem sep_union : { x | (x ∈ s ∨ x ∈ t) ∧ p x } = { x ∈ s | p x } ∪ { x ∈ t | p x } :=
union_inter_distrib_right { x | x ∈ s } { x | x ∈ t } p
@[simp]
theorem sep_inter : { x | (x ∈ s ∧ x ∈ t) ∧ p x } = { x ∈ s | p x } ∩ { x ∈ t | p x } :=
inter_inter_distrib_right s t {x | p x}
@[simp]
theorem sep_and : { x ∈ s | p x ∧ q x } = { x ∈ s | p x } ∩ { x ∈ s | q x } :=
inter_inter_distrib_left s {x | p x} {x | q x}
@[simp]
theorem sep_or : { x ∈ s | p x ∨ q x } = { x ∈ s | p x } ∪ { x ∈ s | q x } :=
inter_union_distrib_left s p q
@[simp]
theorem sep_setOf : { x ∈ { y | p y } | q x } = { x | p x ∧ q x } :=
rfl
end Sep
/-- See also `Set.sdiff_inter_right_comm`. -/
lemma inter_diff_assoc (a b c : Set α) : (a ∩ b) \ c = a ∩ (b \ c) := inf_sdiff_assoc ..
/-- See also `Set.inter_diff_assoc`. -/
lemma sdiff_inter_right_comm (s t u : Set α) : s \ t ∩ u = (s ∩ u) \ t := sdiff_inf_right_comm ..
lemma inter_sdiff_left_comm (s t u : Set α) : s ∩ (t \ u) = t ∩ (s \ u) := inf_sdiff_left_comm ..
theorem diff_union_diff_cancel (hts : t ⊆ s) (hut : u ⊆ t) : s \ t ∪ t \ u = s \ u :=
sdiff_sup_sdiff_cancel hts hut
/-- A version of `diff_union_diff_cancel` with more general hypotheses. -/
theorem diff_union_diff_cancel' (hi : s ∩ u ⊆ t) (hu : t ⊆ s ∪ u) : (s \ t) ∪ (t \ u) = s \ u :=
sdiff_sup_sdiff_cancel' hi hu
theorem diff_diff_eq_sdiff_union (h : u ⊆ s) : s \ (t \ u) = s \ t ∪ u := sdiff_sdiff_eq_sdiff_sup h
theorem inter_diff_distrib_left (s t u : Set α) : s ∩ (t \ u) = (s ∩ t) \ (s ∩ u) :=
inf_sdiff_distrib_left _ _ _
theorem inter_diff_distrib_right (s t u : Set α) : (s \ t) ∩ u = (s ∩ u) \ (t ∩ u) :=
inf_sdiff_distrib_right _ _ _
theorem diff_inter_distrib_right (s t r : Set α) : (t ∩ r) \ s = (t \ s) ∩ (r \ s) :=
inf_sdiff
/-! ### Lemmas about complement -/
theorem compl_def (s : Set α) : sᶜ = { x | x ∉ s } :=
rfl
theorem mem_compl {s : Set α} {x : α} (h : x ∉ s) : x ∈ sᶜ :=
h
theorem compl_setOf {α} (p : α → Prop) : { a | p a }ᶜ = { a | ¬p a } :=
rfl
theorem not_mem_of_mem_compl {s : Set α} {x : α} (h : x ∈ sᶜ) : x ∉ s :=
h
theorem not_mem_compl_iff {x : α} : x ∉ sᶜ ↔ x ∈ s :=
not_not
@[simp]
theorem inter_compl_self (s : Set α) : s ∩ sᶜ = ∅ :=
inf_compl_eq_bot
@[simp]
theorem compl_inter_self (s : Set α) : sᶜ ∩ s = ∅ :=
compl_inf_eq_bot
@[simp]
theorem compl_empty : (∅ : Set α)ᶜ = univ :=
compl_bot
@[simp]
theorem compl_union (s t : Set α) : (s ∪ t)ᶜ = sᶜ ∩ tᶜ :=
compl_sup
theorem compl_inter (s t : Set α) : (s ∩ t)ᶜ = sᶜ ∪ tᶜ :=
compl_inf
@[simp]
theorem compl_univ : (univ : Set α)ᶜ = ∅ :=
compl_top
@[simp]
theorem compl_empty_iff {s : Set α} : sᶜ = ∅ ↔ s = univ :=
compl_eq_bot
@[simp]
theorem compl_univ_iff {s : Set α} : sᶜ = univ ↔ s = ∅ :=
compl_eq_top
theorem compl_ne_univ : sᶜ ≠ univ ↔ s.Nonempty :=
compl_univ_iff.not.trans nonempty_iff_ne_empty.symm
lemma inl_compl_union_inr_compl {α β : Type*} {s : Set α} {t : Set β} :
Sum.inl '' sᶜ ∪ Sum.inr '' tᶜ = (Sum.inl '' s ∪ Sum.inr '' t)ᶜ := by
rw [compl_union]
aesop
theorem nonempty_compl : sᶜ.Nonempty ↔ s ≠ univ :=
(ne_univ_iff_exists_not_mem s).symm
theorem union_eq_compl_compl_inter_compl (s t : Set α) : s ∪ t = (sᶜ ∩ tᶜ)ᶜ :=
ext fun _ => or_iff_not_and_not
theorem inter_eq_compl_compl_union_compl (s t : Set α) : s ∩ t = (sᶜ ∪ tᶜ)ᶜ :=
ext fun _ => and_iff_not_or_not
@[simp]
theorem union_compl_self (s : Set α) : s ∪ sᶜ = univ :=
eq_univ_iff_forall.2 fun _ => em _
@[simp]
theorem compl_union_self (s : Set α) : sᶜ ∪ s = univ := by rw [union_comm, union_compl_self]
theorem compl_subset_comm : sᶜ ⊆ t ↔ tᶜ ⊆ s :=
@compl_le_iff_compl_le _ s _ _
theorem subset_compl_comm : s ⊆ tᶜ ↔ t ⊆ sᶜ :=
@le_compl_iff_le_compl _ _ _ t
@[simp]
theorem compl_subset_compl : sᶜ ⊆ tᶜ ↔ t ⊆ s :=
@compl_le_compl_iff_le (Set α) _ _ _
@[gcongr] theorem compl_subset_compl_of_subset (h : t ⊆ s) : sᶜ ⊆ tᶜ := compl_subset_compl.2 h
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
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
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
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
/-! ### Lemmas about set difference -/
theorem not_mem_diff_of_mem {s t : Set α} {x : α} (hx : x ∈ t) : x ∉ s \ t := fun h => h.2 hx
theorem mem_of_mem_diff {s t : Set α} {x : α} (h : x ∈ s \ t) : x ∈ s :=
h.left
theorem not_mem_of_mem_diff {s t : Set α} {x : α} (h : x ∈ s \ t) : x ∉ t :=
h.right
theorem diff_eq_compl_inter {s t : Set α} : s \ t = tᶜ ∩ s := by rw [diff_eq, inter_comm]
theorem diff_nonempty {s t : Set α} : (s \ t).Nonempty ↔ ¬s ⊆ t :=
inter_compl_nonempty_iff
theorem diff_subset {s t : Set α} : s \ t ⊆ s := show s \ t ≤ s from sdiff_le
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
theorem union_diff_cancel {s t : Set α} (h : s ⊆ t) : s ∪ t \ s = t :=
sup_sdiff_cancel_right h
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
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
@[simp]
theorem union_diff_left {s t : Set α} : (s ∪ t) \ s = t \ s :=
sup_sdiff_left_self
@[simp]
theorem union_diff_right {s t : Set α} : (s ∪ t) \ t = s \ t :=
sup_sdiff_right_self
theorem union_diff_distrib {s t u : Set α} : (s ∪ t) \ u = s \ u ∪ t \ u :=
sup_sdiff
@[simp]
theorem inter_diff_self (a b : Set α) : a ∩ (b \ a) = ∅ :=
inf_sdiff_self_right
@[simp]
theorem inter_union_diff (s t : Set α) : s ∩ t ∪ s \ t = s :=
sup_inf_sdiff s t
@[simp]
theorem diff_union_inter (s t : Set α) : s \ t ∪ s ∩ t = s := by
rw [union_comm]
exact sup_inf_sdiff _ _
@[simp]
theorem inter_union_compl (s t : Set α) : s ∩ t ∪ s ∩ tᶜ = s :=
inter_union_diff _ _
@[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
@[gcongr]
theorem diff_subset_diff_left {s₁ s₂ t : Set α} (h : s₁ ⊆ s₂) : s₁ \ t ⊆ s₂ \ t :=
sdiff_le_sdiff_right ‹s₁ ≤ s₂›
@[gcongr]
theorem diff_subset_diff_right {s t u : Set α} (h : t ⊆ u) : s \ u ⊆ s \ t :=
sdiff_le_sdiff_left ‹t ≤ u›
theorem diff_subset_diff_iff_subset {r : Set α} (hs : s ⊆ r) (ht : t ⊆ r) :
r \ s ⊆ r \ t ↔ t ⊆ s :=
sdiff_le_sdiff_iff_le hs ht
theorem compl_eq_univ_diff (s : Set α) : sᶜ = univ \ s :=
top_sdiff.symm
@[simp]
theorem empty_diff (s : Set α) : (∅ \ s : Set α) = ∅ :=
bot_sdiff
theorem diff_eq_empty {s t : Set α} : s \ t = ∅ ↔ s ⊆ t :=
sdiff_eq_bot_iff
@[simp]
theorem diff_empty {s : Set α} : s \ ∅ = s :=
sdiff_bot
@[simp]
theorem diff_univ (s : Set α) : s \ univ = ∅ :=
diff_eq_empty.2 (subset_univ s)
theorem diff_diff {u : Set α} : (s \ t) \ u = s \ (t ∪ u) :=
sdiff_sdiff_left
-- 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
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
theorem subset_diff_union (s t : Set α) : s ⊆ s \ t ∪ t :=
show s ≤ s \ t ∪ t from le_sdiff_sup
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 _ _)
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
theorem diff_inter {s t u : Set α} : s \ (t ∩ u) = s \ t ∪ s \ u :=
sdiff_inf
theorem diff_inter_diff : s \ t ∩ (s \ u) = s \ (t ∪ u) :=
sdiff_sup.symm
theorem diff_compl : s \ tᶜ = s ∩ t :=
sdiff_compl
theorem compl_diff : (t \ s)ᶜ = s ∪ tᶜ :=
Eq.trans compl_sdiff himp_eq
theorem diff_diff_right {s t u : Set α} : s \ (t \ u) = s \ t ∪ s ∩ u :=
sdiff_sdiff_right'
theorem inter_diff_right_comm : (s ∩ t) \ u = s \ u ∩ t := by
rw [diff_eq, diff_eq, inter_right_comm]
theorem diff_inter_right_comm : (s \ u) ∩ t = (s ∩ t) \ u := by
rw [diff_eq, diff_eq, inter_right_comm]
@[simp]
theorem union_diff_self {s t : Set α} : s ∪ t \ s = s ∪ t :=
sup_sdiff_self _ _
@[simp]
theorem diff_union_self {s t : Set α} : s \ t ∪ t = s ∪ t :=
sdiff_sup_self _ _
@[simp]
theorem diff_inter_self {a b : Set α} : b \ a ∩ a = ∅ :=
inf_sdiff_self_left
@[simp]
theorem diff_inter_self_eq_diff {s t : Set α} : s \ (t ∩ s) = s \ t :=
sdiff_inf_self_right _ _
@[simp]
theorem diff_self_inter {s t : Set α} : s \ (s ∩ t) = s \ t :=
sdiff_inf_self_left _ _
theorem diff_self {s : Set α} : s \ s = ∅ :=
sdiff_self
theorem diff_diff_right_self (s t : Set α) : s \ (s \ t) = s ∩ t :=
sdiff_sdiff_right_self
theorem diff_diff_cancel_left {s t : Set α} (h : s ⊆ t) : t \ (t \ s) = s :=
sdiff_sdiff_eq_self h
theorem union_eq_diff_union_diff_union_inter (s t : Set α) : s ∪ t = s \ t ∪ t \ s ∪ s ∩ t :=
sup_eq_sdiff_sup_sdiff_sup_inf
/-! ### Powerset -/
theorem mem_powerset {x s : Set α} (h : x ⊆ s) : x ∈ 𝒫 s := @h
theorem subset_of_mem_powerset {x s : Set α} (h : x ∈ 𝒫 s) : x ⊆ s := @h
@[simp]
theorem mem_powerset_iff (x s : Set α) : x ∈ 𝒫 s ↔ x ⊆ s :=
Iff.rfl
theorem powerset_inter (s t : Set α) : 𝒫(s ∩ t) = 𝒫 s ∩ 𝒫 t :=
ext fun _ => subset_inter_iff
@[simp]
theorem powerset_mono : 𝒫 s ⊆ 𝒫 t ↔ s ⊆ t :=
⟨fun h => @h _ (fun _ h => h), fun h _ hu _ ha => h (hu ha)⟩
theorem monotone_powerset : Monotone (powerset : Set α → Set (Set α)) := fun _ _ => powerset_mono.2
@[simp]
theorem powerset_nonempty : (𝒫 s).Nonempty :=
⟨∅, fun _ h => empty_subset s h⟩
@[simp]
theorem powerset_empty : 𝒫(∅ : Set α) = {∅} :=
ext fun _ => subset_empty_iff
@[simp]
theorem powerset_univ : 𝒫(univ : Set α) = univ :=
eq_univ_of_forall subset_univ
/-! ### Sets defined as an if-then-else -/
@[deprecated _root_.mem_dite (since := "2025-01-30")]
protected theorem mem_dite (p : Prop) [Decidable p] (s : p → Set α) (t : ¬ p → Set α) (x : α) :
(x ∈ if h : p then s h else t h) ↔ (∀ h : p, x ∈ s h) ∧ ∀ h : ¬p, x ∈ t h :=
_root_.mem_dite
theorem mem_dite_univ_right (p : Prop) [Decidable p] (t : p → Set α) (x : α) :
(x ∈ if h : p then t h else univ) ↔ ∀ h : p, x ∈ t h := by
simp [mem_dite]
@[simp]
theorem mem_ite_univ_right (p : Prop) [Decidable p] (t : Set α) (x : α) :
x ∈ ite p t Set.univ ↔ p → x ∈ t :=
mem_dite_univ_right p (fun _ => t) x
theorem mem_dite_univ_left (p : Prop) [Decidable p] (t : ¬p → Set α) (x : α) :
(x ∈ if h : p then univ else t h) ↔ ∀ h : ¬p, x ∈ t h := by
split_ifs <;> simp_all
@[simp]
theorem mem_ite_univ_left (p : Prop) [Decidable p] (t : Set α) (x : α) :
x ∈ ite p Set.univ t ↔ ¬p → x ∈ t :=
mem_dite_univ_left p (fun _ => t) x
theorem mem_dite_empty_right (p : Prop) [Decidable p] (t : p → Set α) (x : α) :
(x ∈ if h : p then t h else ∅) ↔ ∃ h : p, x ∈ t h := by
simp only [mem_dite, mem_empty_iff_false, imp_false, not_not]
exact ⟨fun h => ⟨h.2, h.1 h.2⟩, fun ⟨h₁, h₂⟩ => ⟨fun _ => h₂, h₁⟩⟩
@[simp]
theorem mem_ite_empty_right (p : Prop) [Decidable p] (t : Set α) (x : α) :
x ∈ ite p t ∅ ↔ p ∧ x ∈ t :=
(mem_dite_empty_right p (fun _ => t) x).trans (by simp)
theorem mem_dite_empty_left (p : Prop) [Decidable p] (t : ¬p → Set α) (x : α) :
(x ∈ if h : p then ∅ else t h) ↔ ∃ h : ¬p, x ∈ t h := by
simp only [mem_dite, mem_empty_iff_false, imp_false]
exact ⟨fun h => ⟨h.1, h.2 h.1⟩, fun ⟨h₁, h₂⟩ => ⟨fun h => h₁ h, fun _ => h₂⟩⟩
@[simp]
theorem mem_ite_empty_left (p : Prop) [Decidable p] (t : Set α) (x : α) :
x ∈ ite p ∅ t ↔ ¬p ∧ x ∈ t :=
(mem_dite_empty_left p (fun _ => t) x).trans (by simp)
/-! ### If-then-else for sets -/
/-- `ite` for sets: `Set.ite t s s' ∩ t = s ∩ t`, `Set.ite t s s' ∩ tᶜ = s' ∩ tᶜ`.
Defined as `s ∩ t ∪ s' \ t`. -/
protected def ite (t s s' : Set α) : Set α :=
s ∩ t ∪ s' \ t
@[simp]
theorem ite_inter_self (t s s' : Set α) : t.ite s s' ∩ t = s ∩ t := by
rw [Set.ite, union_inter_distrib_right, diff_inter_self, inter_assoc, inter_self, union_empty]
@[simp]
theorem ite_compl (t s s' : Set α) : tᶜ.ite s s' = t.ite s' s := by
rw [Set.ite, Set.ite, diff_compl, union_comm, diff_eq]
@[simp]
theorem ite_inter_compl_self (t s s' : Set α) : t.ite s s' ∩ tᶜ = s' ∩ tᶜ := by
rw [← ite_compl, ite_inter_self]
@[simp]
theorem ite_diff_self (t s s' : Set α) : t.ite s s' \ t = s' \ t :=
ite_inter_compl_self t s s'
@[simp]
theorem ite_same (t s : Set α) : t.ite s s = s :=
inter_union_diff _ _
@[simp]
theorem ite_left (s t : Set α) : s.ite s t = s ∪ t := by simp [Set.ite]
@[simp]
theorem ite_right (s t : Set α) : s.ite t s = t ∩ s := by simp [Set.ite]
@[simp]
theorem ite_empty (s s' : Set α) : Set.ite ∅ s s' = s' := by simp [Set.ite]
@[simp]
theorem ite_univ (s s' : Set α) : Set.ite univ s s' = s := by simp [Set.ite]
@[simp]
theorem ite_empty_left (t s : Set α) : t.ite ∅ s = s \ t := by simp [Set.ite]
@[simp]
theorem ite_empty_right (t s : Set α) : t.ite s ∅ = s ∩ t := by simp [Set.ite]
theorem ite_mono (t : Set α) {s₁ s₁' s₂ s₂' : Set α} (h : s₁ ⊆ s₂) (h' : s₁' ⊆ s₂') :
t.ite s₁ s₁' ⊆ t.ite s₂ s₂' :=
union_subset_union (inter_subset_inter_left _ h) (inter_subset_inter_left _ h')
theorem ite_subset_union (t s s' : Set α) : t.ite s s' ⊆ s ∪ s' :=
union_subset_union inter_subset_left diff_subset
theorem inter_subset_ite (t s s' : Set α) : s ∩ s' ⊆ t.ite s s' :=
ite_same t (s ∩ s') ▸ ite_mono _ inter_subset_left inter_subset_right
theorem ite_inter_inter (t s₁ s₂ s₁' s₂' : Set α) :
t.ite (s₁ ∩ s₂) (s₁' ∩ s₂') = t.ite s₁ s₁' ∩ t.ite s₂ s₂' := by
ext x
simp only [Set.ite, Set.mem_inter_iff, Set.mem_diff, Set.mem_union]
tauto
theorem ite_inter (t s₁ s₂ s : Set α) : t.ite (s₁ ∩ s) (s₂ ∩ s) = t.ite s₁ s₂ ∩ s := by
rw [ite_inter_inter, ite_same]
theorem ite_inter_of_inter_eq (t : Set α) {s₁ s₂ s : Set α} (h : s₁ ∩ s = s₂ ∩ s) :
t.ite s₁ s₂ ∩ s = s₁ ∩ s := by rw [← ite_inter, ← h, ite_same]
theorem subset_ite {t s s' u : Set α} : u ⊆ t.ite s s' ↔ u ∩ t ⊆ s ∧ u \ t ⊆ s' := by
simp only [subset_def, ← forall_and]
refine forall_congr' fun x => ?_
by_cases hx : x ∈ t <;> simp [*, Set.ite]
theorem ite_eq_of_subset_left (t : Set α) {s₁ s₂ : Set α} (h : s₁ ⊆ s₂) :
t.ite s₁ s₂ = s₁ ∪ (s₂ \ t) := by
ext x
by_cases hx : x ∈ t <;> simp [*, Set.ite, or_iff_right_of_imp (@h x)]
theorem ite_eq_of_subset_right (t : Set α) {s₁ s₂ : Set α} (h : s₂ ⊆ s₁) :
t.ite s₁ s₂ = (s₁ ∩ t) ∪ s₂ := by
ext x
by_cases hx : x ∈ t <;> simp [*, Set.ite, or_iff_left_of_imp (@h x)]
end Set
open Set
namespace Function
variable {α : Type*} {β : Type*}
theorem Injective.nonempty_apply_iff {f : Set α → Set β} (hf : Injective f) (h2 : f ∅ = ∅)
{s : Set α} : (f s).Nonempty ↔ s.Nonempty := by
rw [nonempty_iff_ne_empty, ← h2, nonempty_iff_ne_empty, hf.ne_iff]
end Function
namespace Subsingleton
variable {α : Type*} [Subsingleton α]
theorem eq_univ_of_nonempty {s : Set α} : s.Nonempty → s = univ := fun ⟨x, hx⟩ =>
eq_univ_of_forall fun y => Subsingleton.elim x y ▸ hx
@[elab_as_elim]
theorem set_cases {p : Set α → Prop} (h0 : p ∅) (h1 : p univ) (s) : p s :=
(s.eq_empty_or_nonempty.elim fun h => h.symm ▸ h0) fun h => (eq_univ_of_nonempty h).symm ▸ h1
theorem mem_iff_nonempty {α : Type*} [Subsingleton α] {s : Set α} {x : α} : x ∈ s ↔ s.Nonempty :=
⟨fun hx => ⟨x, hx⟩, fun ⟨y, hy⟩ => Subsingleton.elim y x ▸ hy⟩
end Subsingleton
/-! ### Decidability instances for sets -/
namespace Set
variable {α : Type u} (s t : Set α) (a b : α)
instance decidableSdiff [Decidable (a ∈ s)] [Decidable (a ∈ t)] : Decidable (a ∈ s \ t) :=
inferInstanceAs (Decidable (a ∈ s ∧ a ∉ t))
instance decidableInter [Decidable (a ∈ s)] [Decidable (a ∈ t)] : Decidable (a ∈ s ∩ t) :=
inferInstanceAs (Decidable (a ∈ s ∧ a ∈ t))
instance decidableUnion [Decidable (a ∈ s)] [Decidable (a ∈ t)] : Decidable (a ∈ s ∪ t) :=
inferInstanceAs (Decidable (a ∈ s ∨ a ∈ t))
instance decidableCompl [Decidable (a ∈ s)] : Decidable (a ∈ sᶜ) :=
inferInstanceAs (Decidable (a ∉ s))
instance decidableEmptyset : Decidable (a ∈ (∅ : Set α)) := Decidable.isFalse (by simp)
instance decidableUniv : Decidable (a ∈ univ) := Decidable.isTrue (by simp)
instance decidableInsert [Decidable (a = b)] [Decidable (a ∈ s)] : Decidable (a ∈ insert b s) :=
inferInstanceAs (Decidable (_ ∨ _))
instance decidableSetOf (p : α → Prop) [Decidable (p a)] : Decidable (a ∈ { a | p a }) := by
assumption
end Set
variable {α : Type*} {s t u : Set α}
namespace Equiv
/-- Given a predicate `p : α → Prop`, produces an equivalence between
`Set {a : α // p a}` and `{s : Set α // ∀ a ∈ s, p a}`. -/
protected def setSubtypeComm (p : α → Prop) :
Set {a : α // p a} ≃ {s : Set α // ∀ a ∈ s, p a} where
toFun s := ⟨{a | ∃ h : p a, s ⟨a, h⟩}, fun _ h ↦ h.1⟩
invFun s := {a | a.val ∈ s.val}
left_inv s := by ext a; exact ⟨fun h ↦ h.2, fun h ↦ ⟨a.property, h⟩⟩
right_inv s := by ext; exact ⟨fun h ↦ h.2, fun h ↦ ⟨s.property _ h, h⟩⟩
@[simp]
protected lemma setSubtypeComm_apply (p : α → Prop) (s : Set {a // p a}) :
(Equiv.setSubtypeComm p) s = ⟨{a | ∃ h : p a, ⟨a, h⟩ ∈ s}, fun _ h ↦ h.1⟩ :=
rfl
@[simp]
protected lemma setSubtypeComm_symm_apply (p : α → Prop) (s : {s // ∀ a ∈ s, p a}) :
(Equiv.setSubtypeComm p).symm s = {a | a.val ∈ s.val} :=
rfl
end Equiv
| Mathlib/Data/Set/Basic.lean | 2,010 | 2,011 | |
/-
Copyright (c) 2022 Joël Riou. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Joël Riou
-/
import Mathlib.AlgebraicTopology.SimplicialObject.Split
import Mathlib.AlgebraicTopology.DoldKan.PInfty
/-!
# Construction of the inverse functor of the Dold-Kan equivalence
In this file, we construct the functor `Γ₀ : ChainComplex C ℕ ⥤ SimplicialObject C`
which shall be the inverse functor of the Dold-Kan equivalence in the case of abelian categories,
and more generally pseudoabelian categories.
By definition, when `K` is a chain_complex, `Γ₀.obj K` is a simplicial object which
sends `Δ : SimplexCategoryᵒᵖ` to a certain coproduct indexed by the set
`Splitting.IndexSet Δ` whose elements consists of epimorphisms `e : Δ.unop ⟶ Δ'.unop`
(with `Δ' : SimplexCategoryᵒᵖ`); the summand attached to such an `e` is `K.X Δ'.unop.len`.
By construction, `Γ₀.obj K` is a split simplicial object whose splitting is `Γ₀.splitting K`.
We also construct `Γ₂ : Karoubi (ChainComplex C ℕ) ⥤ Karoubi (SimplicialObject C)`
which shall be an equivalence for any additive category `C`.
(See `Equivalence.lean` for the general strategy of proof of the Dold-Kan equivalence.)
-/
noncomputable section
open CategoryTheory CategoryTheory.Category CategoryTheory.Limits SimplexCategory
SimplicialObject Opposite CategoryTheory.Idempotents Simplicial DoldKan
namespace AlgebraicTopology
namespace DoldKan
variable {C : Type*} [Category C] [Preadditive C] (K K' : ChainComplex C ℕ) (f : K ⟶ K')
{Δ Δ' Δ'' : SimplexCategory}
/-- `Isδ₀ i` is a simple condition used to check whether a monomorphism `i` in
`SimplexCategory` identifies to the coface map `δ 0`. -/
@[nolint unusedArguments]
def Isδ₀ {Δ Δ' : SimplexCategory} (i : Δ' ⟶ Δ) [Mono i] : Prop :=
Δ.len = Δ'.len + 1 ∧ i.toOrderHom 0 ≠ 0
namespace Isδ₀
theorem iff {j : ℕ} {i : Fin (j + 2)} : Isδ₀ (SimplexCategory.δ i) ↔ i = 0 := by
constructor
· rintro ⟨_, h₂⟩
by_contra h
exact h₂ (Fin.succAbove_ne_zero_zero h)
· rintro rfl
exact ⟨rfl, by dsimp; exact Fin.succ_ne_zero (0 : Fin (j + 1))⟩
theorem eq_δ₀ {n : ℕ} {i : ⦋n⦌ ⟶ ⦋n + 1⦌} [Mono i] (hi : Isδ₀ i) :
i = SimplexCategory.δ 0 := by
obtain ⟨j, rfl⟩ := SimplexCategory.eq_δ_of_mono i
rw [iff] at hi
rw [hi]
end Isδ₀
namespace Γ₀
namespace Obj
/-- In the definition of `(Γ₀.obj K).obj Δ` as a direct sum indexed by `A : Splitting.IndexSet Δ`,
the summand `summand K Δ A` is `K.X A.1.len`. -/
def summand (Δ : SimplexCategoryᵒᵖ) (A : Splitting.IndexSet Δ) : C :=
K.X A.1.unop.len
/-- The functor `Γ₀` sends a chain complex `K` to the simplicial object which
sends `Δ` to the direct sum of the objects `summand K Δ A` for all `A : Splitting.IndexSet Δ` -/
def obj₂ (K : ChainComplex C ℕ) (Δ : SimplexCategoryᵒᵖ) [HasFiniteCoproducts C] : C :=
∐ fun A : Splitting.IndexSet Δ => summand K Δ A
namespace Termwise
/-- A monomorphism `i : Δ' ⟶ Δ` induces a morphism `K.X Δ.len ⟶ K.X Δ'.len` which
is the identity if `Δ = Δ'`, the differential on the complex `K` if `i = δ 0`, and
zero otherwise. -/
def mapMono (K : ChainComplex C ℕ) {Δ' Δ : SimplexCategory} (i : Δ' ⟶ Δ) [Mono i] :
K.X Δ.len ⟶ K.X Δ'.len := by
by_cases Δ = Δ'
· exact eqToHom (by congr)
· by_cases Isδ₀ i
· exact K.d Δ.len Δ'.len
· exact 0
variable (Δ) in
theorem mapMono_id : mapMono K (𝟙 Δ) = 𝟙 _ := by
unfold mapMono
simp only [eq_self_iff_true, eqToHom_refl, dite_eq_ite, if_true]
theorem mapMono_δ₀' (i : Δ' ⟶ Δ) [Mono i] (hi : Isδ₀ i) : mapMono K i = K.d Δ.len Δ'.len := by
unfold mapMono
suffices Δ ≠ Δ' by
simp only [dif_neg this, dif_pos hi]
rintro rfl
simpa only [left_eq_add, Nat.one_ne_zero] using hi.1
@[simp]
theorem mapMono_δ₀ {n : ℕ} : mapMono K (δ (0 : Fin (n + 2))) = K.d (n + 1) n :=
mapMono_δ₀' K _ (by rw [Isδ₀.iff])
theorem mapMono_eq_zero (i : Δ' ⟶ Δ) [Mono i] (h₁ : Δ ≠ Δ') (h₂ : ¬Isδ₀ i) : mapMono K i = 0 := by
unfold mapMono
rw [Ne] at h₁
split_ifs
rfl
variable {K K'}
@[reassoc (attr := simp)]
theorem mapMono_naturality (i : Δ ⟶ Δ') [Mono i] :
| mapMono K i ≫ f.f Δ.len = f.f Δ'.len ≫ mapMono K' i := by
unfold mapMono
| Mathlib/AlgebraicTopology/DoldKan/FunctorGamma.lean | 121 | 122 |
/-
Copyright (c) 2022 Yaël Dillies, Bhavik Mehta. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Yaël Dillies, Bhavik Mehta
-/
import Mathlib.Combinatorics.SimpleGraph.DegreeSum
import Mathlib.Combinatorics.SimpleGraph.Regularity.Lemma
import Mathlib.Combinatorics.SimpleGraph.Triangle.Basic
import Mathlib.Combinatorics.SimpleGraph.Triangle.Counting
import Mathlib.Data.Finset.CastCard
/-!
# Triangle removal lemma
In this file, we prove the triangle removal lemma.
## References
[Yaël Dillies, Bhavik Mehta, *Formalising Szemerédi’s Regularity Lemma in Lean*][srl_itp]
-/
open Finset Fintype Nat SzemerediRegularity
variable {α : Type*} [DecidableEq α] [Fintype α] {G : SimpleGraph α} [DecidableRel G.Adj]
{s t : Finset α} {P : Finpartition (univ : Finset α)} {ε : ℝ}
namespace SimpleGraph
/-- An explicit form for the constant in the triangle removal lemma.
Note that this depends on `SzemerediRegularity.bound`, which is a tower-type exponential. This means
`triangleRemovalBound` is in practice absolutely tiny. -/
noncomputable def triangleRemovalBound (ε : ℝ) : ℝ :=
min (2 * ⌈4/ε⌉₊^3)⁻¹ ((1 - ε/4) * (ε/(16 * bound (ε/8) ⌈4/ε⌉₊))^3)
lemma triangleRemovalBound_pos (hε : 0 < ε) (hε₁ : ε ≤ 1) : 0 < triangleRemovalBound ε := by
have : 0 < 1 - ε / 4 := by linarith
unfold triangleRemovalBound
positivity
lemma triangleRemovalBound_nonpos (hε : ε ≤ 0) : triangleRemovalBound ε ≤ 0 := by
rw [triangleRemovalBound, ceil_eq_zero.2 (div_nonpos_of_nonneg_of_nonpos _ hε)] <;> simp
lemma triangleRemovalBound_mul_cube_lt (hε : 0 < ε) :
triangleRemovalBound ε * ⌈4 / ε⌉₊ ^ 3 < 1 := by
calc
_ ≤ (2 * ⌈4 / ε⌉₊ ^ 3 : ℝ)⁻¹ * ↑⌈4 / ε⌉₊ ^ 3 := by gcongr; exact min_le_left _ _
_ = 2⁻¹ := by rw [mul_inv, inv_mul_cancel_right₀]; positivity
_ < 1 := by norm_num
private lemma aux {n k : ℕ} (hk : 0 < k) (hn : k ≤ n) : n < 2 * k * (n / k) := by
rw [mul_assoc, two_mul, ← add_lt_add_iff_right (n % k), add_right_comm, add_assoc,
mod_add_div n k, add_comm, add_lt_add_iff_right]
apply (mod_lt n hk).trans_le
simpa using Nat.mul_le_mul_left k ((Nat.one_le_div_iff hk).2 hn)
private lemma card_bound (hP₁ : P.IsEquipartition) (hP₃ : #P.parts ≤ bound (ε / 8) ⌈4/ε⌉₊)
(hX : s ∈ P.parts) : card α / (2 * bound (ε / 8) ⌈4 / ε⌉₊ : ℝ) ≤ #s := by
cases isEmpty_or_nonempty α
· simp [Fintype.card_eq_zero]
have := Finset.Nonempty.card_pos ⟨_, hX⟩
calc
_ ≤ card α / (2 * #P.parts : ℝ) := by gcongr
_ ≤ ↑(card α / #P.parts) :=
(div_le_iff₀' (by positivity)).2 <| mod_cast (aux ‹_› P.card_parts_le_card).le
_ ≤ (#s : ℝ) := mod_cast hP₁.average_le_card_part hX
private lemma triangle_removal_aux (hε : 0 < ε) (hP₁ : P.IsEquipartition)
(hP₃ : #P.parts ≤ bound (ε / 8) ⌈4/ε⌉₊)
(ht : t ∈ (G.regularityReduced P (ε/8) (ε/4)).cliqueFinset 3) :
triangleRemovalBound ε * card α ^ 3 ≤ #(G.cliqueFinset 3) := by
rw [mem_cliqueFinset_iff, is3Clique_iff] at ht
obtain ⟨x, y, z, ⟨-, s, hX, Y, hY, xX, yY, nXY, uXY, dXY⟩,
⟨-, X', hX', Z, hZ, xX', zZ, nXZ, uXZ, dXZ⟩,
⟨-, Y', hY', Z', hZ', yY', zZ', nYZ, uYZ, dYZ⟩, rfl⟩ := ht
cases P.disjoint.elim hX hX' (not_disjoint_iff.2 ⟨x, xX, xX'⟩)
cases P.disjoint.elim hY hY' (not_disjoint_iff.2 ⟨y, yY, yY'⟩)
cases P.disjoint.elim hZ hZ' (not_disjoint_iff.2 ⟨z, zZ, zZ'⟩)
have dXY := P.disjoint hX hY nXY
have dXZ := P.disjoint hX hZ nXZ
have dYZ := P.disjoint hY hZ nYZ
have that : 2 * (ε/8) = ε/4 := by ring
have : 0 ≤ 1 - 2 * (ε / 8) := by
have : ε / 4 ≤ 1 := ‹ε / 4 ≤ _›.trans (by exact mod_cast G.edgeDensity_le_one _ _); linarith
calc
_ ≤ (1 - ε/4) * (ε/(16 * bound (ε/8) ⌈4/ε⌉₊))^3 * card α ^ 3 := by
gcongr; exact min_le_right _ _
_ = (1 - 2 * (ε / 8)) * (ε / 8) ^ 3 * (card α / (2 * bound (ε / 8) ⌈4 / ε⌉₊)) *
(card α / (2 * bound (ε / 8) ⌈4 / ε⌉₊)) * (card α / (2 * bound (ε / 8) ⌈4 / ε⌉₊)) := by
ring
_ ≤ (1 - 2 * (ε / 8)) * (ε / 8) ^ 3 * #s * #Y * #Z := by
gcongr <;> exact card_bound hP₁ hP₃ ‹_›
_ ≤ _ :=
triangle_counting G (by rwa [that]) uXY dXY (by rwa [that]) uXZ dXZ (by rwa [that]) uYZ dYZ
lemma regularityReduced_edges_card_aux [Nonempty α] (hε : 0 < ε) (hP : P.IsEquipartition)
(hPε : P.IsUniform G (ε/8)) (hP' : 4 / ε ≤ #P.parts) :
2 * (#G.edgeFinset - #(G.regularityReduced P (ε/8) (ε/4)).edgeFinset : ℝ)
< 2 * ε * (card α ^ 2 : ℕ) := by
let A := (P.nonUniforms G (ε/8)).biUnion fun (U, V) ↦ U ×ˢ V
let B := P.parts.biUnion offDiag
let C := (P.sparsePairs G (ε/4)).biUnion fun (U, V) ↦ G.interedges U V
calc
_ = (#((univ ×ˢ univ).filter fun (x, y) ↦
G.Adj x y ∧ ¬(G.regularityReduced P (ε / 8) (ε /4)).Adj x y) : ℝ) := by
rw [univ_product_univ, mul_sub, filter_and_not, cast_card_sdiff]
· norm_cast
rw [two_mul_card_edgeFinset, two_mul_card_edgeFinset]
· exact monotone_filter_right _ fun xy hxy ↦ regularityReduced_le hxy
_ ≤ #(A ∪ B ∪ C) := by gcongr; exact unreduced_edges_subset
_ ≤ #(A ∪ B) + #C := mod_cast (card_union_le _ _)
_ ≤ #A + #B + #C := by gcongr; exact mod_cast card_union_le _ _
_ < 4 * (ε / 8) * card α ^ 2 + _ + _ := by
gcongr; exact hP.sum_nonUniforms_lt univ_nonempty (by positivity) hPε
_ ≤ _ + ε / 2 * card α ^ 2 + 4 * (ε / 4) * card α ^ 2 := by
gcongr
· exact hP.card_biUnion_offDiag_le hε hP'
· exact hP.card_interedges_sparsePairs_le (G := G) (ε := ε / 4) (by positivity)
_ = 2 * ε * (card α ^ 2 : ℕ) := by norm_cast; ring
|
/-- **Triangle Removal Lemma**. If not all triangles can be removed by removing few edges (on the
order of `(card α)^2`), then there were many triangles to start with (on the order of
`(card α)^3`). -/
lemma FarFromTriangleFree.le_card_cliqueFinset (hG : G.FarFromTriangleFree ε) :
triangleRemovalBound ε * card α ^ 3 ≤ #(G.cliqueFinset 3) := by
cases isEmpty_or_nonempty α
· simp [Fintype.card_eq_zero]
obtain hε | hε := le_or_lt ε 0
· apply (mul_nonpos_of_nonpos_of_nonneg (triangleRemovalBound_nonpos hε) _).trans <;> positivity
let l : ℕ := ⌈4 / ε⌉₊
have hl : 4/ε ≤ l := le_ceil (4/ε)
rcases le_total (card α) l with hl' | hl'
· calc
_ ≤ triangleRemovalBound ε * ↑l ^ 3 := by
gcongr; exact (triangleRemovalBound_pos hε hG.lt_one.le).le
_ ≤ (1 : ℝ) := (triangleRemovalBound_mul_cube_lt hε).le
_ ≤ _ := by simpa [one_le_iff_ne_zero] using (hG.cliqueFinset_nonempty hε).card_pos.ne'
obtain ⟨P, hP₁, hP₂, hP₃, hP₄⟩ := szemeredi_regularity G (by positivity : 0 < ε / 8) hl'
have : 4/ε ≤ #P.parts := hl.trans (cast_le.2 hP₂)
have k := regularityReduced_edges_card_aux hε hP₁ hP₄ this
rw [mul_assoc] at k
replace k := lt_of_mul_lt_mul_left k zero_le_two
obtain ⟨t, ht⟩ := hG.cliqueFinset_nonempty' regularityReduced_le k
| Mathlib/Combinatorics/SimpleGraph/Triangle/Removal.lean | 120 | 143 |
/-
Copyright (c) 2021 Thomas Browning. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Thomas Browning
-/
import Mathlib.GroupTheory.Index
/-!
# Complements
In this file we define the complement of a subgroup.
## Main definitions
- `Subgroup.IsComplement S T` where `S` and `T` are subsets of `G` states that every `g : G` can be
written uniquely as a product `s * t` for `s ∈ S`, `t ∈ T`.
- `H.LeftTransversal` where `H` is a subgroup of `G` is the type of all left-complements of `H`,
i.e. the set of all `S : Set G` that contain exactly one element of each left coset of `H`.
- `H.RightTransversal` where `H` is a subgroup of `G` is the set of all right-complements of `H`,
i.e. the set of all `T : Set G` that contain exactly one element of each right coset of `H`.
## Main results
- `isComplement'_of_coprime` : Subgroups of coprime order are complements.
-/
open Function Set
open scoped Pointwise
namespace Subgroup
variable {G : Type*} [Group G] (H K : Subgroup G) (S T : Set G)
/-- `S` and `T` are complements if `(*) : S × T → G` is a bijection.
This notion generalizes left transversals, right transversals, and complementary subgroups. -/
@[to_additive "`S` and `T` are complements if `(+) : S × T → G` is a bijection"]
def IsComplement : Prop :=
Function.Bijective fun x : S × T => x.1.1 * x.2.1
/-- `H` and `K` are complements if `(*) : H × K → G` is a bijection -/
@[to_additive "`H` and `K` are complements if `(+) : H × K → G` is a bijection"]
abbrev IsComplement' :=
IsComplement (H : Set G) (K : Set G)
/-- The set of left-complements of `T : Set G` -/
@[to_additive (attr := deprecated IsComplement (since := "2024-12-18"))
"The set of left-complements of `T : Set G`"]
def leftTransversals : Set (Set G) :=
{ S : Set G | IsComplement S T }
/-- The set of right-complements of `S : Set G` -/
@[to_additive (attr := deprecated IsComplement (since := "2024-12-18"))
"The set of right-complements of `S : Set G`"]
def rightTransversals : Set (Set G) :=
{ T : Set G | IsComplement S T }
variable {H K S T}
@[to_additive]
theorem isComplement'_def : IsComplement' H K ↔ IsComplement (H : Set G) (K : Set G) :=
Iff.rfl
@[to_additive]
theorem isComplement_iff_existsUnique :
IsComplement S T ↔ ∀ g : G, ∃! x : S × T, x.1.1 * x.2.1 = g :=
Function.bijective_iff_existsUnique _
@[to_additive]
theorem IsComplement.existsUnique (h : IsComplement S T) (g : G) :
∃! x : S × T, x.1.1 * x.2.1 = g :=
isComplement_iff_existsUnique.mp h g
@[to_additive]
theorem IsComplement'.symm (h : IsComplement' H K) : IsComplement' K H := by
let ϕ : H × K ≃ K × H :=
Equiv.mk (fun x => ⟨x.2⁻¹, x.1⁻¹⟩) (fun x => ⟨x.2⁻¹, x.1⁻¹⟩)
(fun x => Prod.ext (inv_inv _) (inv_inv _)) fun x => Prod.ext (inv_inv _) (inv_inv _)
let ψ : G ≃ G := Equiv.mk (fun g : G => g⁻¹) (fun g : G => g⁻¹) inv_inv inv_inv
suffices hf : (ψ ∘ fun x : H × K => x.1.1 * x.2.1) = (fun x : K × H => x.1.1 * x.2.1) ∘ ϕ by
rw [isComplement'_def, IsComplement, ← Equiv.bijective_comp ϕ]
apply (congr_arg Function.Bijective hf).mp -- Porting note: This was a `rw` in mathlib3
rwa [ψ.comp_bijective]
exact funext fun x => mul_inv_rev _ _
@[to_additive]
theorem isComplement'_comm : IsComplement' H K ↔ IsComplement' K H :=
⟨IsComplement'.symm, IsComplement'.symm⟩
@[to_additive]
theorem isComplement_univ_singleton {g : G} : IsComplement (univ : Set G) {g} :=
⟨fun ⟨_, _, rfl⟩ ⟨_, _, rfl⟩ h => Prod.ext (Subtype.ext (mul_right_cancel h)) rfl, fun x =>
⟨⟨⟨x * g⁻¹, ⟨⟩⟩, g, rfl⟩, inv_mul_cancel_right x g⟩⟩
@[to_additive]
theorem isComplement_singleton_univ {g : G} : IsComplement ({g} : Set G) univ :=
⟨fun ⟨⟨_, rfl⟩, _⟩ ⟨⟨_, rfl⟩, _⟩ h => Prod.ext rfl (Subtype.ext (mul_left_cancel h)), fun x =>
⟨⟨⟨g, rfl⟩, g⁻¹ * x, ⟨⟩⟩, mul_inv_cancel_left g x⟩⟩
@[to_additive]
theorem isComplement_singleton_left {g : G} : IsComplement {g} S ↔ S = univ := by
refine
⟨fun h => top_le_iff.mp fun x _ => ?_, fun h => (congr_arg _ h).mpr isComplement_singleton_univ⟩
obtain ⟨⟨⟨z, rfl : z = g⟩, y, _⟩, hy⟩ := h.2 (g * x)
rwa [← mul_left_cancel hy]
@[to_additive]
theorem isComplement_singleton_right {g : G} : IsComplement S {g} ↔ S = univ := by
refine
⟨fun h => top_le_iff.mp fun x _ => ?_, fun h => h ▸ isComplement_univ_singleton⟩
obtain ⟨y, hy⟩ := h.2 (x * g)
conv_rhs at hy => rw [← show y.2.1 = g from y.2.2]
rw [← mul_right_cancel hy]
exact y.1.2
@[to_additive]
theorem isComplement_univ_left : IsComplement univ S ↔ ∃ g : G, S = {g} := by
refine
⟨fun h => Set.exists_eq_singleton_iff_nonempty_subsingleton.mpr ⟨?_, fun a ha b hb => ?_⟩, ?_⟩
· obtain ⟨a, _⟩ := h.2 1
exact ⟨a.2.1, a.2.2⟩
· have : (⟨⟨_, mem_top a⁻¹⟩, ⟨a, ha⟩⟩ : (⊤ : Set G) × S) = ⟨⟨_, mem_top b⁻¹⟩, ⟨b, hb⟩⟩ :=
h.1 ((inv_mul_cancel a).trans (inv_mul_cancel b).symm)
exact Subtype.ext_iff.mp (Prod.ext_iff.mp this).2
· rintro ⟨g, rfl⟩
exact isComplement_univ_singleton
@[to_additive]
theorem isComplement_univ_right : IsComplement S univ ↔ ∃ g : G, S = {g} := by
refine
⟨fun h => Set.exists_eq_singleton_iff_nonempty_subsingleton.mpr ⟨?_, fun a ha b hb => ?_⟩, ?_⟩
· obtain ⟨a, _⟩ := h.2 1
exact ⟨a.1.1, a.1.2⟩
· have : (⟨⟨a, ha⟩, ⟨_, mem_top a⁻¹⟩⟩ : S × (⊤ : Set G)) = ⟨⟨b, hb⟩, ⟨_, mem_top b⁻¹⟩⟩ :=
h.1 ((mul_inv_cancel a).trans (mul_inv_cancel b).symm)
exact Subtype.ext_iff.mp (Prod.ext_iff.mp this).1
· rintro ⟨g, rfl⟩
exact isComplement_singleton_univ
@[to_additive]
lemma IsComplement.mul_eq (h : IsComplement S T) : S * T = univ :=
eq_univ_of_forall fun x ↦ by simpa [mem_mul] using (h.existsUnique x).exists
@[to_additive (attr := simp)]
lemma not_isComplement_empty_left : ¬ IsComplement ∅ T :=
fun h ↦ by simpa [eq_comm (a := ∅)] using h.mul_eq
@[to_additive (attr := simp)]
lemma not_isComplement_empty_right : ¬ IsComplement S ∅ :=
fun h ↦ by simpa [eq_comm (a := ∅)] using h.mul_eq
@[to_additive]
lemma IsComplement.nonempty_left (hst : IsComplement S T) : S.Nonempty := by
contrapose! hst; simp [hst]
@[to_additive]
lemma IsComplement.nonempty_right (hst : IsComplement S T) : T.Nonempty := by
contrapose! hst; simp [hst]
@[to_additive] lemma IsComplement.pairwiseDisjoint_smul (hst : IsComplement S T) :
S.PairwiseDisjoint (· • T) := fun a ha b hb hab ↦ disjoint_iff_forall_ne.2 <| by
rintro _ ⟨c, hc, rfl⟩ _ ⟨d, hd, rfl⟩
exact hst.1.ne (a₁ := (⟨a, ha⟩, ⟨c, hc⟩)) (a₂:= (⟨b, hb⟩, ⟨d, hd⟩)) (by simp [hab])
@[to_additive AddSubgroup.IsComplement.card_mul_card]
lemma IsComplement.card_mul_card (h : IsComplement S T) : Nat.card S * Nat.card T = Nat.card G :=
(Nat.card_prod _ _).symm.trans <| Nat.card_congr <| Equiv.ofBijective _ h
@[to_additive]
theorem isComplement'_top_bot : IsComplement' (⊤ : Subgroup G) ⊥ :=
isComplement_univ_singleton
@[to_additive]
theorem isComplement'_bot_top : IsComplement' (⊥ : Subgroup G) ⊤ :=
isComplement_singleton_univ
@[to_additive (attr := simp)]
theorem isComplement'_bot_left : IsComplement' ⊥ H ↔ H = ⊤ :=
isComplement_singleton_left.trans coe_eq_univ
@[to_additive (attr := simp)]
theorem isComplement'_bot_right : IsComplement' H ⊥ ↔ H = ⊤ :=
isComplement_singleton_right.trans coe_eq_univ
@[to_additive (attr := simp)]
theorem isComplement'_top_left : IsComplement' ⊤ H ↔ H = ⊥ :=
isComplement_univ_left.trans coe_eq_singleton
@[to_additive (attr := simp)]
theorem isComplement'_top_right : IsComplement' H ⊤ ↔ H = ⊥ :=
isComplement_univ_right.trans coe_eq_singleton
@[to_additive]
lemma isComplement_iff_existsUnique_inv_mul_mem :
IsComplement S T ↔ ∀ g, ∃! s : S, (s : G)⁻¹ * g ∈ T := by
convert isComplement_iff_existsUnique with g
constructor <;> rintro ⟨x, hx, hx'⟩
· exact ⟨(x, ⟨_, hx⟩), by simp, by aesop⟩
· exact ⟨x.1, by simp [← hx], fun y hy ↦ (Prod.ext_iff.1 <| by simpa using hx' (y, ⟨_, hy⟩)).1⟩
set_option linter.deprecated false in
@[to_additive
(attr := deprecated isComplement_iff_existsUnique_inv_mul_mem (since := "2024-12-18"))]
theorem mem_leftTransversals_iff_existsUnique_inv_mul_mem :
S ∈ leftTransversals T ↔ ∀ g : G, ∃! s : S, (s : G)⁻¹ * g ∈ T := by
rw [leftTransversals, Set.mem_setOf_eq, isComplement_iff_existsUnique]
refine ⟨fun h g => ?_, fun h g => ?_⟩
· obtain ⟨x, h1, h2⟩ := h g
exact
⟨x.1, (congr_arg (· ∈ T) (eq_inv_mul_of_mul_eq h1)).mp x.2.2, fun y hy =>
(Prod.ext_iff.mp (h2 ⟨y, (↑y)⁻¹ * g, hy⟩ (mul_inv_cancel_left ↑y g))).1⟩
· obtain ⟨x, h1, h2⟩ := h g
refine ⟨⟨x, (↑x)⁻¹ * g, h1⟩, mul_inv_cancel_left (↑x) g, fun y hy => ?_⟩
have hf := h2 y.1 ((congr_arg (· ∈ T) (eq_inv_mul_of_mul_eq hy)).mp y.2.2)
exact Prod.ext hf (Subtype.ext (eq_inv_mul_of_mul_eq (hf ▸ hy)))
@[to_additive]
lemma isComplement_iff_existsUnique_mul_inv_mem :
IsComplement S T ↔ ∀ g, ∃! t : T, g * (t : G)⁻¹ ∈ S := by
convert isComplement_iff_existsUnique with g
constructor <;> rintro ⟨x, hx, hx'⟩
· exact ⟨(⟨_, hx⟩, x), by simp, by aesop⟩
· exact ⟨x.2, by simp [← hx], fun y hy ↦ (Prod.ext_iff.1 <| by simpa using hx' (⟨_, hy⟩, y)).2⟩
set_option linter.deprecated false in
@[to_additive
(attr := deprecated isComplement_iff_existsUnique_mul_inv_mem (since := "2024-12-18"))]
theorem mem_rightTransversals_iff_existsUnique_mul_inv_mem :
S ∈ rightTransversals T ↔ ∀ g : G, ∃! s : S, g * (s : G)⁻¹ ∈ T := by
rw [rightTransversals, Set.mem_setOf_eq, isComplement_iff_existsUnique]
refine ⟨fun h g => ?_, fun h g => ?_⟩
· obtain ⟨x, h1, h2⟩ := h g
exact
⟨x.2, (congr_arg (· ∈ T) (eq_mul_inv_of_mul_eq h1)).mp x.1.2, fun y hy =>
(Prod.ext_iff.mp (h2 ⟨⟨g * (↑y)⁻¹, hy⟩, y⟩ (inv_mul_cancel_right g y))).2⟩
· obtain ⟨x, h1, h2⟩ := h g
refine ⟨⟨⟨g * (↑x)⁻¹, h1⟩, x⟩, inv_mul_cancel_right g x, fun y hy => ?_⟩
have hf := h2 y.2 ((congr_arg (· ∈ T) (eq_mul_inv_of_mul_eq hy)).mp y.1.2)
exact Prod.ext (Subtype.ext (eq_mul_inv_of_mul_eq (hf ▸ hy))) hf
@[to_additive]
lemma isComplement_subgroup_right_iff_existsUnique_quotientGroupMk :
IsComplement S H ↔ ∀ q : G ⧸ H, ∃! s : S, QuotientGroup.mk s.1 = q := by
simp_rw [isComplement_iff_existsUnique_inv_mul_mem, SetLike.mem_coe, ← QuotientGroup.eq,
QuotientGroup.forall_mk]
set_option linter.deprecated false in
@[to_additive
(attr := deprecated isComplement_subgroup_right_iff_existsUnique_quotientGroupMk
(since := "2024-12-18"))]
theorem mem_leftTransversals_iff_existsUnique_quotient_mk''_eq :
S ∈ leftTransversals (H : Set G) ↔
∀ q : Quotient (QuotientGroup.leftRel H), ∃! s : S, Quotient.mk'' s.1 = q := by
simp_rw [mem_leftTransversals_iff_existsUnique_inv_mul_mem, SetLike.mem_coe, ←
QuotientGroup.eq]
exact ⟨fun h q => Quotient.inductionOn' q h, fun h g => h (Quotient.mk'' g)⟩
set_option linter.docPrime false in
@[to_additive]
lemma isComplement_subgroup_left_iff_existsUnique_quotientMk'' :
IsComplement H T ↔
∀ q : Quotient (QuotientGroup.rightRel H), ∃! t : T, Quotient.mk'' t.1 = q := by
simp_rw [isComplement_iff_existsUnique_mul_inv_mem, SetLike.mem_coe,
← QuotientGroup.rightRel_apply, ← Quotient.eq'', Quotient.forall]
set_option linter.deprecated false in
@[to_additive
(attr := deprecated isComplement_subgroup_left_iff_existsUnique_quotientMk''
(since := "2024-12-18"))]
theorem mem_rightTransversals_iff_existsUnique_quotient_mk''_eq :
S ∈ rightTransversals (H : Set G) ↔
∀ q : Quotient (QuotientGroup.rightRel H), ∃! s : S, Quotient.mk'' s.1 = q := by
simp_rw [mem_rightTransversals_iff_existsUnique_mul_inv_mem, SetLike.mem_coe, ←
QuotientGroup.rightRel_apply, ← Quotient.eq'']
exact ⟨fun h q => Quotient.inductionOn' q h, fun h g => h (Quotient.mk'' g)⟩
@[to_additive]
lemma isComplement_subgroup_right_iff_bijective :
IsComplement S H ↔ Bijective (S.restrict (QuotientGroup.mk : G → G ⧸ H)) :=
isComplement_subgroup_right_iff_existsUnique_quotientGroupMk.trans
(bijective_iff_existsUnique (S.restrict QuotientGroup.mk)).symm
set_option linter.deprecated false in
@[to_additive
(attr := deprecated isComplement_subgroup_right_iff_bijective (since := "2024-12-18"))]
theorem mem_leftTransversals_iff_bijective :
S ∈ leftTransversals (H : Set G) ↔
Function.Bijective (S.restrict (Quotient.mk'' : G → Quotient (QuotientGroup.leftRel H))) :=
mem_leftTransversals_iff_existsUnique_quotient_mk''_eq.trans
(Function.bijective_iff_existsUnique (S.restrict Quotient.mk'')).symm
@[to_additive]
lemma isComplement_subgroup_left_iff_bijective :
IsComplement H T ↔
Bijective (T.restrict (Quotient.mk'' : G → Quotient (QuotientGroup.rightRel H))) :=
isComplement_subgroup_left_iff_existsUnique_quotientMk''.trans
(bijective_iff_existsUnique (T.restrict Quotient.mk'')).symm
set_option linter.deprecated false in
@[to_additive
(attr := deprecated isComplement_subgroup_left_iff_bijective (since := "2024-12-18"))]
theorem mem_rightTransversals_iff_bijective :
S ∈ rightTransversals (H : Set G) ↔
Function.Bijective (S.restrict (Quotient.mk'' : G → Quotient (QuotientGroup.rightRel H))) :=
mem_rightTransversals_iff_existsUnique_quotient_mk''_eq.trans
(Function.bijective_iff_existsUnique (S.restrict Quotient.mk'')).symm
@[to_additive]
lemma IsComplement.card_left (h : IsComplement S H) : Nat.card S = H.index :=
Nat.card_congr <| .ofBijective _ <| isComplement_subgroup_right_iff_bijective.mp h
set_option linter.deprecated false in
@[to_additive (attr := deprecated IsComplement.card_left (since := "2024-12-18"))]
theorem card_left_transversal (h : S ∈ leftTransversals (H : Set G)) : Nat.card S = H.index :=
Nat.card_congr <| Equiv.ofBijective _ <| mem_leftTransversals_iff_bijective.mp h
@[to_additive]
lemma IsComplement.card_right (h : IsComplement H T) : Nat.card T = H.index :=
Nat.card_congr <| (Equiv.ofBijective _ <| isComplement_subgroup_left_iff_bijective.mp h).trans <|
QuotientGroup.quotientRightRelEquivQuotientLeftRel H
set_option linter.deprecated false in
@[to_additive (attr := deprecated IsComplement.card_right (since := "2024-12-18"))]
theorem card_right_transversal (h : S ∈ rightTransversals (H : Set G)) : Nat.card S = H.index :=
Nat.card_congr <|
(Equiv.ofBijective _ <| mem_rightTransversals_iff_bijective.mp h).trans <|
QuotientGroup.quotientRightRelEquivQuotientLeftRel H
@[to_additive]
lemma isComplement_range_left {f : G ⧸ H → G} (hf : ∀ q, ↑(f q) = q) :
IsComplement (range f) H := by
rw [isComplement_subgroup_right_iff_bijective]
refine ⟨?_, fun q ↦ ⟨⟨f q, q, rfl⟩, hf q⟩⟩
rintro ⟨-, q₁, rfl⟩ ⟨-, q₂, rfl⟩ h
exact Subtype.ext <| congr_arg f <| ((hf q₁).symm.trans h).trans (hf q₂)
set_option linter.deprecated false in
@[to_additive (attr := deprecated isComplement_range_left (since := "2024-12-18"))]
theorem range_mem_leftTransversals {f : G ⧸ H → G} (hf : ∀ q, ↑(f q) = q) :
Set.range f ∈ leftTransversals (H : Set G) :=
mem_leftTransversals_iff_bijective.mpr
⟨by rintro ⟨-, q₁, rfl⟩ ⟨-, q₂, rfl⟩ h
exact Subtype.ext <| congr_arg f <| ((hf q₁).symm.trans h).trans (hf q₂),
fun q => ⟨⟨f q, q, rfl⟩, hf q⟩⟩
@[to_additive]
| lemma isComplement_range_right {f : Quotient (QuotientGroup.rightRel H) → G}
(hf : ∀ q, Quotient.mk'' (f q) = q) : IsComplement H (range f) := by
rw [isComplement_subgroup_left_iff_bijective]
refine ⟨?_, fun q ↦ ⟨⟨f q, q, rfl⟩, hf q⟩⟩
rintro ⟨-, q₁, rfl⟩ ⟨-, q₂, rfl⟩ h
exact Subtype.ext <| congr_arg f <| ((hf q₁).symm.trans h).trans (hf q₂)
set_option linter.deprecated false in
@[to_additive (attr := deprecated isComplement_range_right (since := "2024-12-18"))]
theorem range_mem_rightTransversals {f : Quotient (QuotientGroup.rightRel H) → G}
(hf : ∀ q, Quotient.mk'' (f q) = q) : Set.range f ∈ rightTransversals (H : Set G) :=
mem_rightTransversals_iff_bijective.mpr
⟨by rintro ⟨-, q₁, rfl⟩ ⟨-, q₂, rfl⟩ h
exact Subtype.ext <| congr_arg f <| ((hf q₁).symm.trans h).trans (hf q₂),
fun q => ⟨⟨f q, q, rfl⟩, hf q⟩⟩
| Mathlib/GroupTheory/Complement.lean | 346 | 360 |
/-
Copyright (c) 2015, 2017 Jeremy Avigad. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Jeremy Avigad, Robert Y. Lewis, Johannes Hölzl, Mario Carneiro, Sébastien Gouëzel
-/
import Mathlib.Algebra.Order.BigOperators.Group.Finset
import Mathlib.Order.Interval.Finset.Nat
import Mathlib.Topology.EMetricSpace.Defs
import Mathlib.Topology.UniformSpace.Compact
import Mathlib.Topology.UniformSpace.LocallyUniformConvergence
import Mathlib.Topology.UniformSpace.UniformEmbedding
/-!
# Extended metric spaces
Further results about extended metric spaces.
-/
open Set Filter
universe u v w
variable {α : Type u} {β : Type v} {X : Type*}
open scoped Uniformity Topology NNReal ENNReal Pointwise
variable [PseudoEMetricSpace α]
/-- The triangle (polygon) inequality for sequences of points; `Finset.Ico` version. -/
theorem edist_le_Ico_sum_edist (f : ℕ → α) {m n} (h : m ≤ n) :
edist (f m) (f n) ≤ ∑ i ∈ Finset.Ico m n, edist (f i) (f (i + 1)) := by
induction n, h using Nat.le_induction with
| base => rw [Finset.Ico_self, Finset.sum_empty, edist_self]
| succ n hle ihn =>
calc
edist (f m) (f (n + 1)) ≤ edist (f m) (f n) + edist (f n) (f (n + 1)) := edist_triangle _ _ _
_ ≤ (∑ i ∈ Finset.Ico m n, _) + _ := add_le_add ihn le_rfl
_ = ∑ i ∈ Finset.Ico m (n + 1), _ := by
{ rw [Nat.Ico_succ_right_eq_insert_Ico hle, Finset.sum_insert, add_comm]; simp }
/-- The triangle (polygon) inequality for sequences of points; `Finset.range` version. -/
theorem edist_le_range_sum_edist (f : ℕ → α) (n : ℕ) :
edist (f 0) (f n) ≤ ∑ i ∈ Finset.range n, edist (f i) (f (i + 1)) :=
Nat.Ico_zero_eq_range ▸ edist_le_Ico_sum_edist f (Nat.zero_le n)
/-- A version of `edist_le_Ico_sum_edist` with each intermediate distance replaced
with an upper estimate. -/
theorem edist_le_Ico_sum_of_edist_le {f : ℕ → α} {m n} (hmn : m ≤ n) {d : ℕ → ℝ≥0∞}
(hd : ∀ {k}, m ≤ k → k < n → edist (f k) (f (k + 1)) ≤ d k) :
edist (f m) (f n) ≤ ∑ i ∈ Finset.Ico m n, d i :=
le_trans (edist_le_Ico_sum_edist f hmn) <|
Finset.sum_le_sum fun _k hk => hd (Finset.mem_Ico.1 hk).1 (Finset.mem_Ico.1 hk).2
/-- A version of `edist_le_range_sum_edist` with each intermediate distance replaced
with an upper estimate. -/
theorem edist_le_range_sum_of_edist_le {f : ℕ → α} (n : ℕ) {d : ℕ → ℝ≥0∞}
(hd : ∀ {k}, k < n → edist (f k) (f (k + 1)) ≤ d k) :
edist (f 0) (f n) ≤ ∑ i ∈ Finset.range n, d i :=
Nat.Ico_zero_eq_range ▸ edist_le_Ico_sum_of_edist_le (zero_le n) fun _ => hd
namespace EMetric
theorem isUniformInducing_iff [PseudoEMetricSpace β] {f : α → β} :
IsUniformInducing f ↔ UniformContinuous f ∧
∀ δ > 0, ∃ ε > 0, ∀ {a b : α}, edist (f a) (f b) < ε → edist a b < δ :=
isUniformInducing_iff'.trans <| Iff.rfl.and <|
((uniformity_basis_edist.comap _).le_basis_iff uniformity_basis_edist).trans <| by
simp only [subset_def, Prod.forall]; rfl
/-- ε-δ characterization of uniform embeddings on pseudoemetric spaces -/
nonrec theorem isUniformEmbedding_iff [PseudoEMetricSpace β] {f : α → β} :
IsUniformEmbedding f ↔ Function.Injective f ∧ UniformContinuous f ∧
∀ δ > 0, ∃ ε > 0, ∀ {a b : α}, edist (f a) (f b) < ε → edist a b < δ :=
(isUniformEmbedding_iff _).trans <| and_comm.trans <| Iff.rfl.and isUniformInducing_iff
/-- If a map between pseudoemetric spaces is a uniform embedding then the edistance between `f x`
and `f y` is controlled in terms of the distance between `x` and `y`.
In fact, this lemma holds for a `IsUniformInducing` map.
TODO: generalize? -/
theorem controlled_of_isUniformEmbedding [PseudoEMetricSpace β] {f : α → β}
(h : IsUniformEmbedding f) :
(∀ ε > 0, ∃ δ > 0, ∀ {a b : α}, edist a b < δ → edist (f a) (f b) < ε) ∧
∀ δ > 0, ∃ ε > 0, ∀ {a b : α}, edist (f a) (f b) < ε → edist a b < δ :=
⟨uniformContinuous_iff.1 h.uniformContinuous, (isUniformEmbedding_iff.1 h).2.2⟩
/-- ε-δ characterization of Cauchy sequences on pseudoemetric spaces -/
protected theorem cauchy_iff {f : Filter α} :
Cauchy f ↔ f ≠ ⊥ ∧ ∀ ε > 0, ∃ t ∈ f, ∀ x, x ∈ t → ∀ y, y ∈ t → edist x y < ε := by
rw [← neBot_iff]; exact uniformity_basis_edist.cauchy_iff
/-- A very useful criterion to show that a space is complete is to show that all sequences
which satisfy a bound of the form `edist (u n) (u m) < B N` for all `n m ≥ N` are
converging. This is often applied for `B N = 2^{-N}`, i.e., with a very fast convergence to
`0`, which makes it possible to use arguments of converging series, while this is impossible
to do in general for arbitrary Cauchy sequences. -/
theorem complete_of_convergent_controlled_sequences (B : ℕ → ℝ≥0∞) (hB : ∀ n, 0 < B n)
(H : ∀ u : ℕ → α, (∀ N n m : ℕ, N ≤ n → N ≤ m → edist (u n) (u m) < B N) →
∃ x, Tendsto u atTop (𝓝 x)) :
CompleteSpace α :=
UniformSpace.complete_of_convergent_controlled_sequences
(fun n => { p : α × α | edist p.1 p.2 < B n }) (fun n => edist_mem_uniformity <| hB n) H
/-- A sequentially complete pseudoemetric space is complete. -/
theorem complete_of_cauchySeq_tendsto :
(∀ u : ℕ → α, CauchySeq u → ∃ a, Tendsto u atTop (𝓝 a)) → CompleteSpace α :=
UniformSpace.complete_of_cauchySeq_tendsto
/-- Expressing locally uniform convergence on a set using `edist`. -/
theorem tendstoLocallyUniformlyOn_iff {ι : Type*} [TopologicalSpace β] {F : ι → β → α} {f : β → α}
{p : Filter ι} {s : Set β} :
TendstoLocallyUniformlyOn F f p s ↔
∀ ε > 0, ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, ∀ᶠ n in p, ∀ y ∈ t, edist (f y) (F n y) < ε := by
refine ⟨fun H ε hε => H _ (edist_mem_uniformity hε), fun H u hu x hx => ?_⟩
rcases mem_uniformity_edist.1 hu with ⟨ε, εpos, hε⟩
rcases H ε εpos x hx with ⟨t, ht, Ht⟩
exact ⟨t, ht, Ht.mono fun n hs x hx => hε (hs x hx)⟩
/-- Expressing uniform convergence on a set using `edist`. -/
theorem tendstoUniformlyOn_iff {ι : Type*} {F : ι → β → α} {f : β → α} {p : Filter ι} {s : Set β} :
TendstoUniformlyOn F f p s ↔ ∀ ε > 0, ∀ᶠ n in p, ∀ x ∈ s, edist (f x) (F n x) < ε := by
refine ⟨fun H ε hε => H _ (edist_mem_uniformity hε), fun H u hu => ?_⟩
rcases mem_uniformity_edist.1 hu with ⟨ε, εpos, hε⟩
exact (H ε εpos).mono fun n hs x hx => hε (hs x hx)
/-- Expressing locally uniform convergence using `edist`. -/
theorem tendstoLocallyUniformly_iff {ι : Type*} [TopologicalSpace β] {F : ι → β → α} {f : β → α}
{p : Filter ι} :
TendstoLocallyUniformly F f p ↔
∀ ε > 0, ∀ x : β, ∃ t ∈ 𝓝 x, ∀ᶠ n in p, ∀ y ∈ t, edist (f y) (F n y) < ε := by
simp only [← tendstoLocallyUniformlyOn_univ, tendstoLocallyUniformlyOn_iff, mem_univ,
forall_const, exists_prop, nhdsWithin_univ]
/-- Expressing uniform convergence using `edist`. -/
theorem tendstoUniformly_iff {ι : Type*} {F : ι → β → α} {f : β → α} {p : Filter ι} :
TendstoUniformly F f p ↔ ∀ ε > 0, ∀ᶠ n in p, ∀ x, edist (f x) (F n x) < ε := by
simp only [← tendstoUniformlyOn_univ, tendstoUniformlyOn_iff, mem_univ, forall_const]
end EMetric
open EMetric
namespace EMetric
variable {x y z : α} {ε ε₁ ε₂ : ℝ≥0∞} {s t : Set α}
theorem inseparable_iff : Inseparable x y ↔ edist x y = 0 := by
simp [inseparable_iff_mem_closure, mem_closure_iff, edist_comm, forall_lt_iff_le']
alias ⟨_root_.Inseparable.edist_eq_zero, _⟩ := EMetric.inseparable_iff
-- see Note [nolint_ge]
/-- In a pseudoemetric space, Cauchy sequences are characterized by the fact that, eventually,
the pseudoedistance between its elements is arbitrarily small -/
theorem cauchySeq_iff [Nonempty β] [SemilatticeSup β] {u : β → α} :
CauchySeq u ↔ ∀ ε > 0, ∃ N, ∀ m, N ≤ m → ∀ n, N ≤ n → edist (u m) (u n) < ε :=
uniformity_basis_edist.cauchySeq_iff
/-- A variation around the emetric characterization of Cauchy sequences -/
theorem cauchySeq_iff' [Nonempty β] [SemilatticeSup β] {u : β → α} :
CauchySeq u ↔ ∀ ε > (0 : ℝ≥0∞), ∃ N, ∀ n ≥ N, edist (u n) (u N) < ε :=
uniformity_basis_edist.cauchySeq_iff'
/-- A variation of the emetric characterization of Cauchy sequences that deals with
`ℝ≥0` upper bounds. -/
theorem cauchySeq_iff_NNReal [Nonempty β] [SemilatticeSup β] {u : β → α} :
CauchySeq u ↔ ∀ ε : ℝ≥0, 0 < ε → ∃ N, ∀ n, N ≤ n → edist (u n) (u N) < ε :=
uniformity_basis_edist_nnreal.cauchySeq_iff'
theorem totallyBounded_iff {s : Set α} :
TotallyBounded s ↔ ∀ ε > 0, ∃ t : Set α, t.Finite ∧ s ⊆ ⋃ y ∈ t, ball y ε :=
⟨fun H _ε ε0 => H _ (edist_mem_uniformity ε0), fun H _r ru =>
let ⟨ε, ε0, hε⟩ := mem_uniformity_edist.1 ru
let ⟨t, ft, h⟩ := H ε ε0
⟨t, ft, h.trans <| iUnion₂_mono fun _ _ _ => hε⟩⟩
theorem totallyBounded_iff' {s : Set α} :
TotallyBounded s ↔ ∀ ε > 0, ∃ t, t ⊆ s ∧ Set.Finite t ∧ s ⊆ ⋃ y ∈ t, ball y ε :=
⟨fun H _ε ε0 => (totallyBounded_iff_subset.1 H) _ (edist_mem_uniformity ε0), fun H _r ru =>
let ⟨ε, ε0, hε⟩ := mem_uniformity_edist.1 ru
let ⟨t, _, ft, h⟩ := H ε ε0
⟨t, ft, h.trans <| iUnion₂_mono fun _ _ _ => hε⟩⟩
section Compact
-- TODO: generalize to metrizable spaces
/-- A compact set in a pseudo emetric space is separable, i.e., it is a subset of the closure of a
countable set. -/
theorem subset_countable_closure_of_compact {s : Set α} (hs : IsCompact s) :
∃ t, t ⊆ s ∧ t.Countable ∧ s ⊆ closure t := by
refine subset_countable_closure_of_almost_dense_set s fun ε hε => ?_
rcases totallyBounded_iff'.1 hs.totallyBounded ε hε with ⟨t, -, htf, hst⟩
exact ⟨t, htf.countable, hst.trans <| iUnion₂_mono fun _ _ => ball_subset_closedBall⟩
end Compact
section SecondCountable
open TopologicalSpace
variable (α) in
/-- A sigma compact pseudo emetric space has second countable topology. -/
instance (priority := 90) secondCountable_of_sigmaCompact [SigmaCompactSpace α] :
SecondCountableTopology α := by
suffices SeparableSpace α by exact UniformSpace.secondCountable_of_separable α
choose T _ hTc hsubT using fun n =>
subset_countable_closure_of_compact (isCompact_compactCovering α n)
refine ⟨⟨⋃ n, T n, countable_iUnion hTc, fun x => ?_⟩⟩
rcases iUnion_eq_univ_iff.1 (iUnion_compactCovering α) x with ⟨n, hn⟩
exact closure_mono (subset_iUnion _ n) (hsubT _ hn)
theorem secondCountable_of_almost_dense_set
(hs : ∀ ε > 0, ∃ t : Set α, t.Countable ∧ ⋃ x ∈ t, closedBall x ε = univ) :
SecondCountableTopology α := by
suffices SeparableSpace α from UniformSpace.secondCountable_of_separable α
have : ∀ ε > 0, ∃ t : Set α, Set.Countable t ∧ univ ⊆ ⋃ x ∈ t, closedBall x ε := by
simpa only [univ_subset_iff] using hs
rcases subset_countable_closure_of_almost_dense_set (univ : Set α) this with ⟨t, -, htc, ht⟩
exact ⟨⟨t, htc, fun x => ht (mem_univ x)⟩⟩
end SecondCountable
end EMetric
variable {γ : Type w} [EMetricSpace γ]
-- see Note [lower instance priority]
/-- An emetric space is separated -/
instance (priority := 100) EMetricSpace.instT0Space : T0Space γ where
t0 _ _ h := eq_of_edist_eq_zero <| inseparable_iff.1 h
/-- A map between emetric spaces is a uniform embedding if and only if the edistance between `f x`
and `f y` is controlled in terms of the distance between `x` and `y` and conversely. -/
theorem EMetric.isUniformEmbedding_iff' [PseudoEMetricSpace β] {f : γ → β} :
IsUniformEmbedding f ↔
(∀ ε > 0, ∃ δ > 0, ∀ {a b : γ}, edist a b < δ → edist (f a) (f b) < ε) ∧
∀ δ > 0, ∃ ε > 0, ∀ {a b : γ}, edist (f a) (f b) < ε → edist a b < δ := by
rw [isUniformEmbedding_iff_isUniformInducing, isUniformInducing_iff, uniformContinuous_iff]
/-- If a `PseudoEMetricSpace` is a T₀ space, then it is an `EMetricSpace`. -/
-- TODO: make it an instance?
abbrev EMetricSpace.ofT0PseudoEMetricSpace (α : Type*) [PseudoEMetricSpace α] [T0Space α] :
EMetricSpace α :=
{ ‹PseudoEMetricSpace α› with
eq_of_edist_eq_zero := fun h => (EMetric.inseparable_iff.2 h).eq }
/-- The product of two emetric spaces, with the max distance, is an extended
metric spaces. We make sure that the uniform structure thus constructed is the one
corresponding to the product of uniform spaces, to avoid diamond problems. -/
instance Prod.emetricSpaceMax [EMetricSpace β] : EMetricSpace (γ × β) :=
.ofT0PseudoEMetricSpace _
namespace EMetric
/-- A compact set in an emetric space is separable, i.e., it is the closure of a countable set. -/
theorem countable_closure_of_compact {s : Set γ} (hs : IsCompact s) :
∃ t, t ⊆ s ∧ t.Countable ∧ s = closure t := by
rcases subset_countable_closure_of_compact hs with ⟨t, hts, htc, hsub⟩
exact ⟨t, hts, htc, hsub.antisymm (closure_minimal hts hs.isClosed)⟩
end EMetric
/-!
### Separation quotient
-/
instance [PseudoEMetricSpace X] : EDist (SeparationQuotient X) where
edist := SeparationQuotient.lift₂ edist fun _ _ _ _ hx hy =>
edist_congr (EMetric.inseparable_iff.1 hx) (EMetric.inseparable_iff.1 hy)
@[simp] theorem SeparationQuotient.edist_mk [PseudoEMetricSpace X] (x y : X) :
edist (mk x) (mk y) = edist x y :=
rfl
open SeparationQuotient in
instance [PseudoEMetricSpace X] : EMetricSpace (SeparationQuotient X) :=
@EMetricSpace.ofT0PseudoEMetricSpace (SeparationQuotient X)
{ edist_self := surjective_mk.forall.2 edist_self,
edist_comm := surjective_mk.forall₂.2 edist_comm,
edist_triangle := surjective_mk.forall₃.2 edist_triangle,
toUniformSpace := inferInstance,
uniformity_edist := comap_injective (surjective_mk.prodMap surjective_mk) <| by
simp [comap_mk_uniformity, PseudoEMetricSpace.uniformity_edist] } _
namespace TopologicalSpace
section Compact
open Topology
/-- If a set `s` is separable in a (pseudo extended) metric space, then it admits a countable dense
subset. This is not obvious, as the countable set whose closure covers `s` given by the definition
of separability does not need in general to be contained in `s`. -/
theorem IsSeparable.exists_countable_dense_subset
{s : Set α} (hs : IsSeparable s) : ∃ t, t ⊆ s ∧ t.Countable ∧ s ⊆ closure t := by
have : ∀ ε > 0, ∃ t : Set α, t.Countable ∧ s ⊆ ⋃ x ∈ t, closedBall x ε := fun ε ε0 => by
rcases hs with ⟨t, htc, hst⟩
refine ⟨t, htc, hst.trans fun x hx => ?_⟩
rcases mem_closure_iff.1 hx ε ε0 with ⟨y, hyt, hxy⟩
exact mem_iUnion₂.2 ⟨y, hyt, mem_closedBall.2 hxy.le⟩
exact subset_countable_closure_of_almost_dense_set _ this
/-- If a set `s` is separable, then the corresponding subtype is separable in a (pseudo extended)
metric space. This is not obvious, as the countable set whose closure covers `s` does not need in
general to be contained in `s`. -/
theorem IsSeparable.separableSpace {s : Set α} (hs : IsSeparable s) :
SeparableSpace s := by
rcases hs.exists_countable_dense_subset with ⟨t, hts, htc, hst⟩
lift t to Set s using hts
refine ⟨⟨t, countable_of_injective_of_countable_image Subtype.coe_injective.injOn htc, ?_⟩⟩
rwa [IsInducing.subtypeVal.dense_iff, Subtype.forall]
end Compact
end TopologicalSpace
section LebesgueNumberLemma
variable {s : Set α}
theorem lebesgue_number_lemma_of_emetric {ι : Sort*} {c : ι → Set α} (hs : IsCompact s)
(hc₁ : ∀ i, IsOpen (c i)) (hc₂ : s ⊆ ⋃ i, c i) : ∃ δ > 0, ∀ x ∈ s, ∃ i, ball x δ ⊆ c i := by
simpa only [ball, UniformSpace.ball, preimage_setOf_eq, edist_comm]
using uniformity_basis_edist.lebesgue_number_lemma hs hc₁ hc₂
theorem lebesgue_number_lemma_of_emetric_nhds' {c : (x : α) → x ∈ s → Set α} (hs : IsCompact s)
(hc : ∀ x hx, c x hx ∈ 𝓝 x) : ∃ δ > 0, ∀ x ∈ s, ∃ y : s, ball x δ ⊆ c y y.2 := by
simpa only [ball, UniformSpace.ball, preimage_setOf_eq, edist_comm]
using uniformity_basis_edist.lebesgue_number_lemma_nhds' hs hc
theorem lebesgue_number_lemma_of_emetric_nhds {c : α → Set α} (hs : IsCompact s)
(hc : ∀ x ∈ s, c x ∈ 𝓝 x) : ∃ δ > 0, ∀ x ∈ s, ∃ y, ball x δ ⊆ c y := by
simpa only [ball, UniformSpace.ball, preimage_setOf_eq, edist_comm]
using uniformity_basis_edist.lebesgue_number_lemma_nhds hs hc
theorem lebesgue_number_lemma_of_emetric_nhdsWithin' {c : (x : α) → x ∈ s → Set α}
(hs : IsCompact s) (hc : ∀ x hx, c x hx ∈ 𝓝[s] x) :
∃ δ > 0, ∀ x ∈ s, ∃ y : s, ball x δ ∩ s ⊆ c y y.2 := by
simpa only [ball, UniformSpace.ball, preimage_setOf_eq, edist_comm]
using uniformity_basis_edist.lebesgue_number_lemma_nhdsWithin' hs hc
theorem lebesgue_number_lemma_of_emetric_nhdsWithin {c : α → Set α} (hs : IsCompact s)
(hc : ∀ x ∈ s, c x ∈ 𝓝[s] x) : ∃ δ > 0, ∀ x ∈ s, ∃ y, ball x δ ∩ s ⊆ c y := by
simpa only [ball, UniformSpace.ball, preimage_setOf_eq, edist_comm]
using uniformity_basis_edist.lebesgue_number_lemma_nhdsWithin hs hc
theorem lebesgue_number_lemma_of_emetric_sUnion {c : Set (Set α)} (hs : IsCompact s)
(hc₁ : ∀ t ∈ c, IsOpen t) (hc₂ : s ⊆ ⋃₀ c) : ∃ δ > 0, ∀ x ∈ s, ∃ t ∈ c, ball x δ ⊆ t := by
rw [sUnion_eq_iUnion] at hc₂; simpa using lebesgue_number_lemma_of_emetric hs (by simpa) hc₂
end LebesgueNumberLemma
| Mathlib/Topology/EMetricSpace/Basic.lean | 613 | 616 | |
/-
Copyright (c) 2021 Rémy Degenne. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Rémy Degenne
-/
import Mathlib.MeasureTheory.Function.LpSeminorm.Trim
import Mathlib.MeasureTheory.Function.StronglyMeasurable.Inner
import Mathlib.MeasureTheory.Function.StronglyMeasurable.Lp
/-! # Functions a.e. measurable with respect to a sub-σ-algebra
A function `f` verifies `AEStronglyMeasurable[m] f μ` if it is `μ`-a.e. equal to
an `m`-strongly measurable function. This is similar to `AEStronglyMeasurable`, but the
`MeasurableSpace` structures used for the measurability statement and for the measure are
different.
We define `lpMeas F 𝕜 m p μ`, the subspace of `Lp F p μ` containing functions `f` verifying
`AEStronglyMeasurable[m] f μ`, i.e. functions which are `μ`-a.e. equal to an `m`-strongly
measurable function.
## Main statements
We define an `IsometryEquiv` between `lpMeasSubgroup` and the `Lp` space corresponding to the
measure `μ.trim hm`. As a consequence, the completeness of `Lp` implies completeness of `lpMeas`.
`Lp.induction_stronglyMeasurable` (see also `MemLp.induction_stronglyMeasurable`):
To prove something for an `Lp` function a.e. strongly measurable with respect to a
sub-σ-algebra `m` in a normed space, it suffices to show that
* the property holds for (multiples of) characteristic functions which are measurable w.r.t. `m`;
* is closed under addition;
* the set of functions in `Lp` strongly measurable w.r.t. `m` for which the property holds is
closed.
-/
open TopologicalSpace Filter
open scoped ENNReal MeasureTheory
namespace MeasureTheory
/-- A function `f` verifies `AEStronglyMeasurable[m] f μ` if it is `μ`-a.e. equal to
an `m`-strongly measurable function. This is similar to `AEStronglyMeasurable`, but the
`MeasurableSpace` structures used for the measurability statement and for the measure are
different. -/
@[deprecated AEStronglyMeasurable (since := "2025-01-23")]
def AEStronglyMeasurable' {α β} [TopologicalSpace β] (m : MeasurableSpace α)
{_ : MeasurableSpace α} (f : α → β) (μ : Measure α) : Prop := AEStronglyMeasurable[m] f μ
namespace AEStronglyMeasurable'
variable {α β 𝕜 : Type*} {m m0 : MeasurableSpace α} {μ : Measure α} [TopologicalSpace β]
{f g : α → β}
@[deprecated AEStronglyMeasurable.congr (since := "2025-01-23")]
theorem congr (hf : AEStronglyMeasurable[m] f μ) (hfg : f =ᵐ[μ] g) :
AEStronglyMeasurable[m] g μ := AEStronglyMeasurable.congr hf hfg
@[deprecated AEStronglyMeasurable.mono (since := "2025-01-23")]
theorem mono {m'} (hf : AEStronglyMeasurable[m] f μ) (hm : m ≤ m') :
AEStronglyMeasurable[m'] f μ := AEStronglyMeasurable.mono hm hf
@[deprecated AEStronglyMeasurable.add (since := "2025-01-23")]
theorem add [Add β] [ContinuousAdd β] (hf : AEStronglyMeasurable[m] f μ)
(hg : AEStronglyMeasurable[m] g μ) : AEStronglyMeasurable[m] (f + g) μ :=
AEStronglyMeasurable.add hf hg
@[deprecated AEStronglyMeasurable.neg (since := "2025-01-23")]
theorem neg [Neg β] [ContinuousNeg β] {f : α → β} (hfm : AEStronglyMeasurable[m] f μ) :
AEStronglyMeasurable[m] (-f) μ :=
AEStronglyMeasurable.neg hfm
@[deprecated AEStronglyMeasurable.sub (since := "2025-01-23")]
theorem sub [AddGroup β] [IsTopologicalAddGroup β] {f g : α → β} (hfm : AEStronglyMeasurable[m] f μ)
(hgm : AEStronglyMeasurable[m] g μ) : AEStronglyMeasurable[m] (f - g) μ :=
AEStronglyMeasurable.sub hfm hgm
@[deprecated AEStronglyMeasurable.const_smul (since := "2025-01-23")]
theorem const_smul [SMul 𝕜 β] [ContinuousConstSMul 𝕜 β] (c : 𝕜) (hf : AEStronglyMeasurable[m] f μ) :
AEStronglyMeasurable[m] (c • f) μ :=
AEStronglyMeasurable.const_smul hf _
@[deprecated AEStronglyMeasurable.const_inner (since := "2025-01-23")]
theorem const_inner {𝕜 β} [RCLike 𝕜] [NormedAddCommGroup β] [InnerProductSpace 𝕜 β] {f : α → β}
(hfm : AEStronglyMeasurable[m] f μ) (c : β) :
AEStronglyMeasurable[m] (fun x => (inner c (f x) : 𝕜)) μ :=
AEStronglyMeasurable.const_inner hfm
@[deprecated AEStronglyMeasurable.of_subsingleton_cod (since := "2025-01-23")]
theorem of_subsingleton [Subsingleton β] : AEStronglyMeasurable[m] f μ := .of_subsingleton_cod
@[deprecated AEStronglyMeasurable.of_subsingleton_dom (since := "2025-01-23")]
theorem of_subsingleton' [Subsingleton α] : AEStronglyMeasurable[m] f μ := .of_subsingleton_dom
/-- An `m`-strongly measurable function almost everywhere equal to `f`. -/
@[deprecated AEStronglyMeasurable.mk (since := "2025-01-23")]
noncomputable def mk (f : α → β) (hfm : AEStronglyMeasurable[m] f μ) : α → β :=
AEStronglyMeasurable.mk f hfm
@[deprecated AEStronglyMeasurable.stronglyMeasurable_mk (since := "2025-01-23")]
theorem stronglyMeasurable_mk {f : α → β} (hfm : AEStronglyMeasurable[m] f μ) :
StronglyMeasurable[m] (hfm.mk f) :=
AEStronglyMeasurable.stronglyMeasurable_mk hfm
@[deprecated AEStronglyMeasurable.ae_eq_mk (since := "2025-01-23")]
theorem ae_eq_mk {f : α → β} (hfm : AEStronglyMeasurable[m] f μ) : f =ᵐ[μ] hfm.mk f :=
AEStronglyMeasurable.ae_eq_mk hfm
@[deprecated Continuous.comp_aestronglyMeasurable (since := "2025-01-23")]
theorem continuous_comp {γ} [TopologicalSpace γ] {f : α → β} {g : β → γ} (hg : Continuous g)
(hf : AEStronglyMeasurable[m] f μ) : AEStronglyMeasurable[m] (g ∘ f) μ :=
hg.comp_aestronglyMeasurable hf
end AEStronglyMeasurable'
@[deprecated AEStronglyMeasurable.of_trim (since := "2025-01-23")]
theorem aeStronglyMeasurable'_of_aeStronglyMeasurable'_trim {α β} {m m0 m0' : MeasurableSpace α}
[TopologicalSpace β] (hm0 : m0 ≤ m0') {μ : Measure α} {f : α → β}
(hf : AEStronglyMeasurable[m] f (μ.trim hm0)) : AEStronglyMeasurable[m] f μ := .of_trim hm0 hf
@[deprecated StronglyMeasurable.aestronglyMeasurable (since := "2025-01-23")]
theorem StronglyMeasurable.aeStronglyMeasurable' {α β} {m _ : MeasurableSpace α}
[TopologicalSpace β] {μ : Measure α} {f : α → β} (hf : StronglyMeasurable[m] f) :
AEStronglyMeasurable[m] f μ := hf.aestronglyMeasurable
| theorem ae_eq_trim_iff_of_aestronglyMeasurable {α β} [TopologicalSpace β] [MetrizableSpace β]
{m m0 : MeasurableSpace α} {μ : Measure α} {f g : α → β} (hm : m ≤ m0)
(hfm : AEStronglyMeasurable[m] f μ) (hgm : AEStronglyMeasurable[m] g μ) :
hfm.mk f =ᵐ[μ.trim hm] hgm.mk g ↔ f =ᵐ[μ] g :=
(hfm.stronglyMeasurable_mk.ae_eq_trim_iff hm hgm.stronglyMeasurable_mk).trans
| Mathlib/MeasureTheory/Function/ConditionalExpectation/AEMeasurable.lean | 127 | 131 |
/-
Copyright (c) 2017 Johannes Hölzl. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johannes Hölzl, Mario Carneiro, Jeremy Avigad
-/
import Mathlib.Data.Set.Finite.Basic
import Mathlib.Data.Set.Finite.Range
import Mathlib.Data.Set.Lattice
import Mathlib.Topology.Defs.Filter
/-!
# Openness and closedness of a set
This file provides lemmas relating to the predicates `IsOpen` and `IsClosed` of a set endowed with
a topology.
## Implementation notes
Topology in mathlib heavily uses filters (even more than in Bourbaki). See explanations in
<https://leanprover-community.github.io/theories/topology.html>.
## References
* [N. Bourbaki, *General Topology*][bourbaki1966]
* [I. M. James, *Topologies and Uniformities*][james1999]
## Tags
topological space
-/
open Set Filter Topology
universe u v
/-- A constructor for topologies by specifying the closed sets,
and showing that they satisfy the appropriate conditions. -/
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
section TopologicalSpace
variable {X : Type u} {ι : Sort v} {α : Type*} {x : X} {s s₁ s₂ t : Set X} {p p₁ p₂ : X → Prop}
lemma isOpen_mk {p h₁ h₂ h₃} : IsOpen[⟨p, h₁, h₂, h₃⟩] s ↔ p s := Iff.rfl
@[ext (iff := false)]
protected theorem TopologicalSpace.ext :
∀ {f g : TopologicalSpace X}, IsOpen[f] = IsOpen[g] → f = g
| ⟨_, _, _, _⟩, ⟨_, _, _, _⟩, rfl => rfl
protected theorem TopologicalSpace.ext_iff {t t' : TopologicalSpace X} :
t = t' ↔ ∀ s, IsOpen[t] s ↔ IsOpen[t'] s :=
⟨fun h _ => h ▸ Iff.rfl, fun h => by ext; exact h _⟩
theorem isOpen_fold {t : TopologicalSpace X} : t.IsOpen s = IsOpen[t] s :=
rfl
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)
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
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⟩)
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
theorem Set.Finite.isOpen_sInter {s : Set (Set X)} (hs : s.Finite) (h : ∀ t ∈ s, IsOpen t) :
IsOpen (⋂₀ s) := by
induction s, hs using Set.Finite.induction_on with
| empty => rw [sInter_empty]; exact isOpen_univ
| insert _ _ ih =>
simp only [sInter_insert, forall_mem_insert] at h ⊢
exact h.1.inter (ih h.2)
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)
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)
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
@[simp]
theorem isOpen_const {p : Prop} : IsOpen { _x : X | p } := by by_cases p <;> simp [*]
theorem IsOpen.and : IsOpen { x | p₁ x } → IsOpen { x | p₂ x } → IsOpen { x | p₁ x ∧ p₂ x } :=
IsOpen.inter
@[simp] theorem isOpen_compl_iff : IsOpen sᶜ ↔ IsClosed s :=
⟨fun h => ⟨h⟩, fun h => h.isOpen_compl⟩
theorem TopologicalSpace.ext_iff_isClosed {X} {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
theorem isClosed_const {p : Prop} : IsClosed { _x : X | p } := ⟨isOpen_const (p := ¬p)⟩
@[simp] theorem isClosed_empty : IsClosed (∅ : Set X) := isClosed_const
@[simp] theorem isClosed_univ : IsClosed (univ : Set X) := isClosed_const
lemma IsOpen.isLocallyClosed (hs : IsOpen s) : IsLocallyClosed s :=
⟨_, _, hs, isClosed_univ, (inter_univ _).symm⟩
lemma IsClosed.isLocallyClosed (hs : IsClosed s) : IsLocallyClosed s :=
⟨_, _, isOpen_univ, hs, (univ_inter _).symm⟩
theorem IsClosed.union : IsClosed s₁ → IsClosed s₂ → IsClosed (s₁ ∪ s₂) := by
simpa only [← isOpen_compl_iff, compl_union] using IsOpen.inter
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
theorem isClosed_iInter {f : ι → Set X} (h : ∀ i, IsClosed (f i)) : IsClosed (⋂ i, f i) :=
isClosed_sInter <| forall_mem_range.2 h
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
@[simp]
theorem isClosed_compl_iff {s : Set X} : IsClosed sᶜ ↔ IsOpen s := by
rw [← isOpen_compl_iff, compl_compl]
alias ⟨_, IsOpen.isClosed_compl⟩ := isClosed_compl_iff
theorem IsOpen.sdiff (h₁ : IsOpen s) (h₂ : IsClosed t) : IsOpen (s \ t) :=
IsOpen.inter h₁ h₂.isOpen_compl
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
theorem IsClosed.sdiff (h₁ : IsClosed s) (h₂ : IsOpen t) : IsClosed (s \ t) :=
IsClosed.inter h₁ (isClosed_compl_iff.mpr h₂)
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
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
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
theorem IsClosed.not : IsClosed { a | p a } → IsOpen { a | ¬p a } :=
isOpen_compl_iff.mpr
/-!
### Limits of filters in topological spaces
In this section we define functions that return a limit of a filter (or of a function along a
filter), if it exists, and a random point otherwise. These functions are rarely used in Mathlib,
most of the theorems are written using `Filter.Tendsto`. One of the reasons is that
`Filter.limUnder f g = x` is not equivalent to `Filter.Tendsto g f (𝓝 x)` unless the codomain is a
Hausdorff space and `g` has a limit along `f`.
-/
section lim
/-- If a filter `f` is majorated by some `𝓝 x`, then it is majorated by `𝓝 (Filter.lim f)`. We
formulate this lemma with a `[Nonempty X]` argument of `lim` derived from `h` to make it useful for
types without a `[Nonempty X]` instance. Because of the built-in proof irrelevance, Lean will unify
this instance with any other instance. -/
theorem le_nhds_lim {f : Filter X} (h : ∃ x, f ≤ 𝓝 x) : f ≤ 𝓝 (@lim _ _ (nonempty_of_exists h) f) :=
Classical.epsilon_spec h
/-- If `g` tends to some `𝓝 x` along `f`, then it tends to `𝓝 (Filter.limUnder f g)`. We formulate
this lemma with a `[Nonempty X]` argument of `lim` derived from `h` to make it useful for types
without a `[Nonempty X]` instance. Because of the built-in proof irrelevance, Lean will unify this
instance with any other instance. -/
theorem tendsto_nhds_limUnder {f : Filter α} {g : α → X} (h : ∃ x, Tendsto g f (𝓝 x)) :
Tendsto g f (𝓝 (@limUnder _ _ _ (nonempty_of_exists h) f g)) :=
le_nhds_lim h
theorem limUnder_of_not_tendsto [hX : Nonempty X] {f : Filter α} {g : α → X}
(h : ¬ ∃ x, Tendsto g f (𝓝 x)) :
limUnder f g = Classical.choice hX := by
simp_rw [Tendsto] at h
simp_rw [limUnder, lim, Classical.epsilon, Classical.strongIndefiniteDescription, dif_neg h]
end lim
end TopologicalSpace
| Mathlib/Topology/Basic.lean | 1,376 | 1,378 | |
/-
Copyright (c) 2019 Sébastien Gouëzel. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Sébastien Gouëzel, Yury Kudryashov, David Loeffler
-/
import Mathlib.Analysis.Convex.Slope
import Mathlib.Analysis.Calculus.Deriv.MeanValue
/-!
# Convexity of functions and derivatives
Here we relate convexity of functions `ℝ → ℝ` to properties of their derivatives.
## Main results
* `MonotoneOn.convexOn_of_deriv`, `convexOn_of_deriv2_nonneg` : if the derivative of a function
is increasing or its second derivative is nonnegative, then the original function is convex.
* `ConvexOn.monotoneOn_deriv`: if a function is convex and differentiable, then its derivative is
monotone.
-/
open Metric Set Asymptotics ContinuousLinearMap Filter
open scoped Topology NNReal
/-!
## Monotonicity of `f'` implies convexity of `f`
-/
/-- If a function `f` is continuous on a convex set `D ⊆ ℝ`, is differentiable on its interior,
and `f'` is monotone on the interior, then `f` is convex on `D`. -/
theorem MonotoneOn.convexOn_of_deriv {D : Set ℝ} (hD : Convex ℝ D) {f : ℝ → ℝ}
(hf : ContinuousOn f D) (hf' : DifferentiableOn ℝ f (interior D))
(hf'_mono : MonotoneOn (deriv f) (interior D)) : ConvexOn ℝ D f :=
convexOn_of_slope_mono_adjacent hD
(by
intro x y z hx hz hxy hyz
-- First we prove some trivial inclusions
have hxzD : Icc x z ⊆ D := hD.ordConnected.out hx hz
have hxyD : Icc x y ⊆ D := (Icc_subset_Icc_right hyz.le).trans hxzD
have hxyD' : Ioo x y ⊆ interior D :=
subset_sUnion_of_mem ⟨isOpen_Ioo, Ioo_subset_Icc_self.trans hxyD⟩
have hyzD : Icc y z ⊆ D := (Icc_subset_Icc_left hxy.le).trans hxzD
have hyzD' : Ioo y z ⊆ interior D :=
subset_sUnion_of_mem ⟨isOpen_Ioo, Ioo_subset_Icc_self.trans hyzD⟩
-- Then we apply MVT to both `[x, y]` and `[y, z]`
obtain ⟨a, ⟨hxa, hay⟩, ha⟩ : ∃ a ∈ Ioo x y, deriv f a = (f y - f x) / (y - x) :=
exists_deriv_eq_slope f hxy (hf.mono hxyD) (hf'.mono hxyD')
obtain ⟨b, ⟨hyb, hbz⟩, hb⟩ : ∃ b ∈ Ioo y z, deriv f b = (f z - f y) / (z - y) :=
exists_deriv_eq_slope f hyz (hf.mono hyzD) (hf'.mono hyzD')
rw [← ha, ← hb]
exact hf'_mono (hxyD' ⟨hxa, hay⟩) (hyzD' ⟨hyb, hbz⟩) (hay.trans hyb).le)
/-- If a function `f` is continuous on a convex set `D ⊆ ℝ`, is differentiable on its interior,
and `f'` is antitone on the interior, then `f` is concave on `D`. -/
theorem AntitoneOn.concaveOn_of_deriv {D : Set ℝ} (hD : Convex ℝ D) {f : ℝ → ℝ}
(hf : ContinuousOn f D) (hf' : DifferentiableOn ℝ f (interior D))
(h_anti : AntitoneOn (deriv f) (interior D)) : ConcaveOn ℝ D f :=
haveI : MonotoneOn (deriv (-f)) (interior D) := by
simpa only [← deriv.neg] using h_anti.neg
neg_convexOn_iff.mp (this.convexOn_of_deriv hD hf.neg hf'.neg)
theorem StrictMonoOn.exists_slope_lt_deriv_aux {x y : ℝ} {f : ℝ → ℝ} (hf : ContinuousOn f (Icc x y))
(hxy : x < y) (hf'_mono : StrictMonoOn (deriv f) (Ioo x y)) (h : ∀ w ∈ Ioo x y, deriv f w ≠ 0) :
∃ a ∈ Ioo x y, (f y - f x) / (y - x) < deriv f a := by
have A : DifferentiableOn ℝ f (Ioo x y) := fun w wmem =>
(differentiableAt_of_deriv_ne_zero (h w wmem)).differentiableWithinAt
obtain ⟨a, ⟨hxa, hay⟩, ha⟩ : ∃ a ∈ Ioo x y, deriv f a = (f y - f x) / (y - x) :=
exists_deriv_eq_slope f hxy hf A
rcases nonempty_Ioo.2 hay with ⟨b, ⟨hab, hby⟩⟩
refine ⟨b, ⟨hxa.trans hab, hby⟩, ?_⟩
rw [← ha]
exact hf'_mono ⟨hxa, hay⟩ ⟨hxa.trans hab, hby⟩ hab
theorem StrictMonoOn.exists_slope_lt_deriv {x y : ℝ} {f : ℝ → ℝ} (hf : ContinuousOn f (Icc x y))
(hxy : x < y) (hf'_mono : StrictMonoOn (deriv f) (Ioo x y)) :
∃ a ∈ Ioo x y, (f y - f x) / (y - x) < deriv f a := by
by_cases h : ∀ w ∈ Ioo x y, deriv f w ≠ 0
· apply StrictMonoOn.exists_slope_lt_deriv_aux hf hxy hf'_mono h
· push_neg at h
rcases h with ⟨w, ⟨hxw, hwy⟩, hw⟩
obtain ⟨a, ⟨hxa, haw⟩, ha⟩ : ∃ a ∈ Ioo x w, (f w - f x) / (w - x) < deriv f a := by
apply StrictMonoOn.exists_slope_lt_deriv_aux _ hxw _ _
· exact hf.mono (Icc_subset_Icc le_rfl hwy.le)
· exact hf'_mono.mono (Ioo_subset_Ioo le_rfl hwy.le)
· intro z hz
rw [← hw]
apply ne_of_lt
exact hf'_mono ⟨hz.1, hz.2.trans hwy⟩ ⟨hxw, hwy⟩ hz.2
obtain ⟨b, ⟨hwb, hby⟩, hb⟩ : ∃ b ∈ Ioo w y, (f y - f w) / (y - w) < deriv f b := by
apply StrictMonoOn.exists_slope_lt_deriv_aux _ hwy _ _
· refine hf.mono (Icc_subset_Icc hxw.le le_rfl)
· exact hf'_mono.mono (Ioo_subset_Ioo hxw.le le_rfl)
· intro z hz
rw [← hw]
apply ne_of_gt
exact hf'_mono ⟨hxw, hwy⟩ ⟨hxw.trans hz.1, hz.2⟩ hz.1
refine ⟨b, ⟨hxw.trans hwb, hby⟩, ?_⟩
simp only [div_lt_iff₀, hxy, hxw, hwy, sub_pos] at ha hb ⊢
have : deriv f a * (w - x) < deriv f b * (w - x) := by
apply mul_lt_mul _ le_rfl (sub_pos.2 hxw) _
· exact hf'_mono ⟨hxa, haw.trans hwy⟩ ⟨hxw.trans hwb, hby⟩ (haw.trans hwb)
· rw [← hw]
exact (hf'_mono ⟨hxw, hwy⟩ ⟨hxw.trans hwb, hby⟩ hwb).le
linarith
theorem StrictMonoOn.exists_deriv_lt_slope_aux {x y : ℝ} {f : ℝ → ℝ} (hf : ContinuousOn f (Icc x y))
(hxy : x < y) (hf'_mono : StrictMonoOn (deriv f) (Ioo x y)) (h : ∀ w ∈ Ioo x y, deriv f w ≠ 0) :
∃ a ∈ Ioo x y, deriv f a < (f y - f x) / (y - x) := by
have A : DifferentiableOn ℝ f (Ioo x y) := fun w wmem =>
(differentiableAt_of_deriv_ne_zero (h w wmem)).differentiableWithinAt
obtain ⟨a, ⟨hxa, hay⟩, ha⟩ : ∃ a ∈ Ioo x y, deriv f a = (f y - f x) / (y - x) :=
exists_deriv_eq_slope f hxy hf A
rcases nonempty_Ioo.2 hxa with ⟨b, ⟨hxb, hba⟩⟩
refine ⟨b, ⟨hxb, hba.trans hay⟩, ?_⟩
rw [← ha]
exact hf'_mono ⟨hxb, hba.trans hay⟩ ⟨hxa, hay⟩ hba
theorem StrictMonoOn.exists_deriv_lt_slope {x y : ℝ} {f : ℝ → ℝ} (hf : ContinuousOn f (Icc x y))
(hxy : x < y) (hf'_mono : StrictMonoOn (deriv f) (Ioo x y)) :
∃ a ∈ Ioo x y, deriv f a < (f y - f x) / (y - x) := by
by_cases h : ∀ w ∈ Ioo x y, deriv f w ≠ 0
· apply StrictMonoOn.exists_deriv_lt_slope_aux hf hxy hf'_mono h
· push_neg at h
rcases h with ⟨w, ⟨hxw, hwy⟩, hw⟩
obtain ⟨a, ⟨hxa, haw⟩, ha⟩ : ∃ a ∈ Ioo x w, deriv f a < (f w - f x) / (w - x) := by
apply StrictMonoOn.exists_deriv_lt_slope_aux _ hxw _ _
· exact hf.mono (Icc_subset_Icc le_rfl hwy.le)
· exact hf'_mono.mono (Ioo_subset_Ioo le_rfl hwy.le)
· intro z hz
rw [← hw]
apply ne_of_lt
exact hf'_mono ⟨hz.1, hz.2.trans hwy⟩ ⟨hxw, hwy⟩ hz.2
obtain ⟨b, ⟨hwb, hby⟩, hb⟩ : ∃ b ∈ Ioo w y, deriv f b < (f y - f w) / (y - w) := by
apply StrictMonoOn.exists_deriv_lt_slope_aux _ hwy _ _
· refine hf.mono (Icc_subset_Icc hxw.le le_rfl)
· exact hf'_mono.mono (Ioo_subset_Ioo hxw.le le_rfl)
· intro z hz
rw [← hw]
apply ne_of_gt
exact hf'_mono ⟨hxw, hwy⟩ ⟨hxw.trans hz.1, hz.2⟩ hz.1
refine ⟨a, ⟨hxa, haw.trans hwy⟩, ?_⟩
simp only [lt_div_iff₀, hxy, hxw, hwy, sub_pos] at ha hb ⊢
have : deriv f a * (y - w) < deriv f b * (y - w) := by
apply mul_lt_mul _ le_rfl (sub_pos.2 hwy) _
· exact hf'_mono ⟨hxa, haw.trans hwy⟩ ⟨hxw.trans hwb, hby⟩ (haw.trans hwb)
· rw [← hw]
exact (hf'_mono ⟨hxw, hwy⟩ ⟨hxw.trans hwb, hby⟩ hwb).le
linarith
/-- If a function `f` is continuous on a convex set `D ⊆ ℝ`, and `f'` is strictly monotone on the
interior, then `f` is strictly convex on `D`.
Note that we don't require differentiability, since it is guaranteed at all but at most
one point by the strict monotonicity of `f'`. -/
theorem StrictMonoOn.strictConvexOn_of_deriv {D : Set ℝ} (hD : Convex ℝ D) {f : ℝ → ℝ}
(hf : ContinuousOn f D) (hf' : StrictMonoOn (deriv f) (interior D)) : StrictConvexOn ℝ D f :=
strictConvexOn_of_slope_strict_mono_adjacent hD fun {x y z} hx hz hxy hyz => by
-- First we prove some trivial inclusions
have hxzD : Icc x z ⊆ D := hD.ordConnected.out hx hz
have hxyD : Icc x y ⊆ D := (Icc_subset_Icc_right hyz.le).trans hxzD
have hxyD' : Ioo x y ⊆ interior D :=
subset_sUnion_of_mem ⟨isOpen_Ioo, Ioo_subset_Icc_self.trans hxyD⟩
have hyzD : Icc y z ⊆ D := (Icc_subset_Icc_left hxy.le).trans hxzD
have hyzD' : Ioo y z ⊆ interior D :=
subset_sUnion_of_mem ⟨isOpen_Ioo, Ioo_subset_Icc_self.trans hyzD⟩
-- Then we get points `a` and `b` in each interval `[x, y]` and `[y, z]` where the derivatives
-- can be compared to the slopes between `x, y` and `y, z` respectively.
obtain ⟨a, ⟨hxa, hay⟩, ha⟩ : ∃ a ∈ Ioo x y, (f y - f x) / (y - x) < deriv f a :=
StrictMonoOn.exists_slope_lt_deriv (hf.mono hxyD) hxy (hf'.mono hxyD')
obtain ⟨b, ⟨hyb, hbz⟩, hb⟩ : ∃ b ∈ Ioo y z, deriv f b < (f z - f y) / (z - y) :=
StrictMonoOn.exists_deriv_lt_slope (hf.mono hyzD) hyz (hf'.mono hyzD')
apply ha.trans (lt_trans _ hb)
exact hf' (hxyD' ⟨hxa, hay⟩) (hyzD' ⟨hyb, hbz⟩) (hay.trans hyb)
/-- If a function `f` is continuous on a convex set `D ⊆ ℝ` and `f'` is strictly antitone on the
interior, then `f` is strictly concave on `D`.
Note that we don't require differentiability, since it is guaranteed at all but at most
one point by the strict antitonicity of `f'`. -/
theorem StrictAntiOn.strictConcaveOn_of_deriv {D : Set ℝ} (hD : Convex ℝ D) {f : ℝ → ℝ}
(hf : ContinuousOn f D) (h_anti : StrictAntiOn (deriv f) (interior D)) :
StrictConcaveOn ℝ D f :=
have : StrictMonoOn (deriv (-f)) (interior D) := by simpa only [← deriv.neg] using h_anti.neg
neg_neg f ▸ (this.strictConvexOn_of_deriv hD hf.neg).neg
/-- If a function `f` is differentiable and `f'` is monotone on `ℝ` then `f` is convex. -/
theorem Monotone.convexOn_univ_of_deriv {f : ℝ → ℝ} (hf : Differentiable ℝ f)
(hf'_mono : Monotone (deriv f)) : ConvexOn ℝ univ f :=
(hf'_mono.monotoneOn _).convexOn_of_deriv convex_univ hf.continuous.continuousOn
hf.differentiableOn
/-- If a function `f` is differentiable and `f'` is antitone on `ℝ` then `f` is concave. -/
theorem Antitone.concaveOn_univ_of_deriv {f : ℝ → ℝ} (hf : Differentiable ℝ f)
(hf'_anti : Antitone (deriv f)) : ConcaveOn ℝ univ f :=
(hf'_anti.antitoneOn _).concaveOn_of_deriv convex_univ hf.continuous.continuousOn
hf.differentiableOn
/-- If a function `f` is continuous and `f'` is strictly monotone on `ℝ` then `f` is strictly
convex. Note that we don't require differentiability, since it is guaranteed at all but at most
one point by the strict monotonicity of `f'`. -/
theorem StrictMono.strictConvexOn_univ_of_deriv {f : ℝ → ℝ} (hf : Continuous f)
(hf'_mono : StrictMono (deriv f)) : StrictConvexOn ℝ univ f :=
(hf'_mono.strictMonoOn _).strictConvexOn_of_deriv convex_univ hf.continuousOn
/-- If a function `f` is continuous and `f'` is strictly antitone on `ℝ` then `f` is strictly
concave. Note that we don't require differentiability, since it is guaranteed at all but at most
one point by the strict antitonicity of `f'`. -/
theorem StrictAnti.strictConcaveOn_univ_of_deriv {f : ℝ → ℝ} (hf : Continuous f)
(hf'_anti : StrictAnti (deriv f)) : StrictConcaveOn ℝ univ f :=
(hf'_anti.strictAntiOn _).strictConcaveOn_of_deriv convex_univ hf.continuousOn
/-- If a function `f` is continuous on a convex set `D ⊆ ℝ`, is twice differentiable on its
interior, and `f''` is nonnegative on the interior, then `f` is convex on `D`. -/
theorem convexOn_of_deriv2_nonneg {D : Set ℝ} (hD : Convex ℝ D) {f : ℝ → ℝ} (hf : ContinuousOn f D)
(hf' : DifferentiableOn ℝ f (interior D)) (hf'' : DifferentiableOn ℝ (deriv f) (interior D))
(hf''_nonneg : ∀ x ∈ interior D, 0 ≤ deriv^[2] f x) : ConvexOn ℝ D f :=
(monotoneOn_of_deriv_nonneg hD.interior hf''.continuousOn (by rwa [interior_interior]) <| by
rwa [interior_interior]).convexOn_of_deriv
hD hf hf'
/-- If a function `f` is continuous on a convex set `D ⊆ ℝ`, is twice differentiable on its
interior, and `f''` is nonpositive on the interior, then `f` is concave on `D`. -/
theorem concaveOn_of_deriv2_nonpos {D : Set ℝ} (hD : Convex ℝ D) {f : ℝ → ℝ} (hf : ContinuousOn f D)
(hf' : DifferentiableOn ℝ f (interior D)) (hf'' : DifferentiableOn ℝ (deriv f) (interior D))
(hf''_nonpos : ∀ x ∈ interior D, deriv^[2] f x ≤ 0) : ConcaveOn ℝ D f :=
(antitoneOn_of_deriv_nonpos hD.interior hf''.continuousOn (by rwa [interior_interior]) <| by
rwa [interior_interior]).concaveOn_of_deriv
hD hf hf'
/-- If a function `f` is continuous on a convex set `D ⊆ ℝ`, is twice differentiable on its
interior, and `f''` is nonnegative on the interior, then `f` is convex on `D`. -/
lemma convexOn_of_hasDerivWithinAt2_nonneg {D : Set ℝ} (hD : Convex ℝ D) {f f' f'' : ℝ → ℝ}
(hf : ContinuousOn f D) (hf' : ∀ x ∈ interior D, HasDerivWithinAt f (f' x) (interior D) x)
(hf'' : ∀ x ∈ interior D, HasDerivWithinAt f' (f'' x) (interior D) x)
(hf''₀ : ∀ x ∈ interior D, 0 ≤ f'' x) : ConvexOn ℝ D f := by
have : (interior D).EqOn (deriv f) f' := deriv_eqOn isOpen_interior hf'
refine convexOn_of_deriv2_nonneg hD hf (fun x hx ↦ (hf' _ hx).differentiableWithinAt) ?_ ?_
· rw [differentiableOn_congr this]
exact fun x hx ↦ (hf'' _ hx).differentiableWithinAt
· rintro x hx
convert hf''₀ _ hx using 1
dsimp
rw [deriv_eqOn isOpen_interior (fun y hy ↦ ?_) hx]
exact (hf'' _ hy).congr this <| by rw [this hy]
/-- If a function `f` is continuous on a convex set `D ⊆ ℝ`, is twice differentiable on its
interior, and `f''` is nonpositive on the interior, then `f` is concave on `D`. -/
lemma concaveOn_of_hasDerivWithinAt2_nonpos {D : Set ℝ} (hD : Convex ℝ D) {f f' f'' : ℝ → ℝ}
(hf : ContinuousOn f D) (hf' : ∀ x ∈ interior D, HasDerivWithinAt f (f' x) (interior D) x)
(hf'' : ∀ x ∈ interior D, HasDerivWithinAt f' (f'' x) (interior D) x)
(hf''₀ : ∀ x ∈ interior D, f'' x ≤ 0) : ConcaveOn ℝ D f := by
have : (interior D).EqOn (deriv f) f' := deriv_eqOn isOpen_interior hf'
refine concaveOn_of_deriv2_nonpos hD hf (fun x hx ↦ (hf' _ hx).differentiableWithinAt) ?_ ?_
· rw [differentiableOn_congr this]
exact fun x hx ↦ (hf'' _ hx).differentiableWithinAt
· rintro x hx
convert hf''₀ _ hx using 1
dsimp
rw [deriv_eqOn isOpen_interior (fun y hy ↦ ?_) hx]
exact (hf'' _ hy).congr this <| by rw [this hy]
/-- If a function `f` is continuous on a convex set `D ⊆ ℝ` and `f''` is strictly positive on the
interior, then `f` is strictly convex on `D`.
Note that we don't require twice differentiability explicitly as it is already implied by the second
derivative being strictly positive, except at at most one point. -/
theorem strictConvexOn_of_deriv2_pos {D : Set ℝ} (hD : Convex ℝ D) {f : ℝ → ℝ}
(hf : ContinuousOn f D) (hf'' : ∀ x ∈ interior D, 0 < (deriv^[2] f) x) :
StrictConvexOn ℝ D f :=
((strictMonoOn_of_deriv_pos hD.interior fun z hz =>
(differentiableAt_of_deriv_ne_zero
(hf'' z hz).ne').differentiableWithinAt.continuousWithinAt) <|
by rwa [interior_interior]).strictConvexOn_of_deriv
hD hf
/-- If a function `f` is continuous on a convex set `D ⊆ ℝ` and `f''` is strictly negative on the
interior, then `f` is strictly concave on `D`.
Note that we don't require twice differentiability explicitly as it already implied by the second
derivative being strictly negative, except at at most one point. -/
theorem strictConcaveOn_of_deriv2_neg {D : Set ℝ} (hD : Convex ℝ D) {f : ℝ → ℝ}
(hf : ContinuousOn f D) (hf'' : ∀ x ∈ interior D, deriv^[2] f x < 0) :
StrictConcaveOn ℝ D f :=
((strictAntiOn_of_deriv_neg hD.interior fun z hz =>
(differentiableAt_of_deriv_ne_zero
(hf'' z hz).ne).differentiableWithinAt.continuousWithinAt) <|
by rwa [interior_interior]).strictConcaveOn_of_deriv
hD hf
/-- If a function `f` is twice differentiable on an open convex set `D ⊆ ℝ` and
`f''` is nonnegative on `D`, then `f` is convex on `D`. -/
theorem convexOn_of_deriv2_nonneg' {D : Set ℝ} (hD : Convex ℝ D) {f : ℝ → ℝ}
(hf' : DifferentiableOn ℝ f D) (hf'' : DifferentiableOn ℝ (deriv f) D)
(hf''_nonneg : ∀ x ∈ D, 0 ≤ (deriv^[2] f) x) : ConvexOn ℝ D f :=
convexOn_of_deriv2_nonneg hD hf'.continuousOn (hf'.mono interior_subset)
(hf''.mono interior_subset) fun x hx => hf''_nonneg x (interior_subset hx)
/-- If a function `f` is twice differentiable on an open convex set `D ⊆ ℝ` and
`f''` is nonpositive on `D`, then `f` is concave on `D`. -/
theorem concaveOn_of_deriv2_nonpos' {D : Set ℝ} (hD : Convex ℝ D) {f : ℝ → ℝ}
(hf' : DifferentiableOn ℝ f D) (hf'' : DifferentiableOn ℝ (deriv f) D)
(hf''_nonpos : ∀ x ∈ D, deriv^[2] f x ≤ 0) : ConcaveOn ℝ D f :=
concaveOn_of_deriv2_nonpos hD hf'.continuousOn (hf'.mono interior_subset)
(hf''.mono interior_subset) fun x hx => hf''_nonpos x (interior_subset hx)
/-- If a function `f` is continuous on a convex set `D ⊆ ℝ` and `f''` is strictly positive on `D`,
then `f` is strictly convex on `D`.
Note that we don't require twice differentiability explicitly as it is already implied by the second
derivative being strictly positive, except at at most one point. -/
theorem strictConvexOn_of_deriv2_pos' {D : Set ℝ} (hD : Convex ℝ D) {f : ℝ → ℝ}
(hf : ContinuousOn f D) (hf'' : ∀ x ∈ D, 0 < (deriv^[2] f) x) : StrictConvexOn ℝ D f :=
strictConvexOn_of_deriv2_pos hD hf fun x hx => hf'' x (interior_subset hx)
/-- If a function `f` is continuous on a convex set `D ⊆ ℝ` and `f''` is strictly negative on `D`,
then `f` is strictly concave on `D`.
Note that we don't require twice differentiability explicitly as it is already implied by the second
derivative being strictly negative, except at at most one point. -/
theorem strictConcaveOn_of_deriv2_neg' {D : Set ℝ} (hD : Convex ℝ D) {f : ℝ → ℝ}
(hf : ContinuousOn f D) (hf'' : ∀ x ∈ D, deriv^[2] f x < 0) : StrictConcaveOn ℝ D f :=
strictConcaveOn_of_deriv2_neg hD hf fun x hx => hf'' x (interior_subset hx)
/-- If a function `f` is twice differentiable on `ℝ`, and `f''` is nonnegative on `ℝ`,
then `f` is convex on `ℝ`. -/
theorem convexOn_univ_of_deriv2_nonneg {f : ℝ → ℝ} (hf' : Differentiable ℝ f)
(hf'' : Differentiable ℝ (deriv f)) (hf''_nonneg : ∀ x, 0 ≤ (deriv^[2] f) x) :
ConvexOn ℝ univ f :=
convexOn_of_deriv2_nonneg' convex_univ hf'.differentiableOn hf''.differentiableOn fun x _ =>
hf''_nonneg x
/-- If a function `f` is twice differentiable on `ℝ`, and `f''` is nonpositive on `ℝ`,
then `f` is concave on `ℝ`. -/
theorem concaveOn_univ_of_deriv2_nonpos {f : ℝ → ℝ} (hf' : Differentiable ℝ f)
(hf'' : Differentiable ℝ (deriv f)) (hf''_nonpos : ∀ x, deriv^[2] f x ≤ 0) :
ConcaveOn ℝ univ f :=
concaveOn_of_deriv2_nonpos' convex_univ hf'.differentiableOn hf''.differentiableOn fun x _ =>
hf''_nonpos x
/-- If a function `f` is continuous on `ℝ`, and `f''` is strictly positive on `ℝ`,
then `f` is strictly convex on `ℝ`.
Note that we don't require twice differentiability explicitly as it is already implied by the second
derivative being strictly positive, except at at most one point. -/
theorem strictConvexOn_univ_of_deriv2_pos {f : ℝ → ℝ} (hf : Continuous f)
(hf'' : ∀ x, 0 < (deriv^[2] f) x) : StrictConvexOn ℝ univ f :=
strictConvexOn_of_deriv2_pos' convex_univ hf.continuousOn fun x _ => hf'' x
/-- If a function `f` is continuous on `ℝ`, and `f''` is strictly negative on `ℝ`,
then `f` is strictly concave on `ℝ`.
Note that we don't require twice differentiability explicitly as it is already implied by the second
derivative being strictly negative, except at at most one point. -/
theorem strictConcaveOn_univ_of_deriv2_neg {f : ℝ → ℝ} (hf : Continuous f)
(hf'' : ∀ x, deriv^[2] f x < 0) : StrictConcaveOn ℝ univ f :=
strictConcaveOn_of_deriv2_neg' convex_univ hf.continuousOn fun x _ => hf'' x
/-!
## Convexity of `f` implies monotonicity of `f'`
In this section we prove inequalities relating derivatives of convex functions to slopes of secant
lines, and deduce that if `f` is convex then its derivative is monotone (and similarly for strict
convexity / strict monotonicity).
-/
section slope
variable {𝕜 : Type*} [Field 𝕜] [LinearOrder 𝕜] [IsStrictOrderedRing 𝕜]
{s : Set 𝕜} {f : 𝕜 → 𝕜} {x : 𝕜}
/-- If `f : 𝕜 → 𝕜` is convex on `s`, then for any point `x ∈ s` the slope of the secant line of `f`
through `x` is monotone on `s \ {x}`. -/
lemma ConvexOn.slope_mono (hfc : ConvexOn 𝕜 s f) (hx : x ∈ s) : MonotoneOn (slope f x) (s \ {x}) :=
(slope_fun_def_field f _).symm ▸ fun _ hy _ hz hz' ↦ hfc.secant_mono hx (mem_of_mem_diff hy)
(mem_of_mem_diff hz) (not_mem_of_mem_diff hy :) (not_mem_of_mem_diff hz :) hz'
lemma ConvexOn.monotoneOn_slope_gt (hfc : ConvexOn 𝕜 s f) (hxs : x ∈ s) :
MonotoneOn (slope f x) {y ∈ s | x < y} :=
(hfc.slope_mono hxs).mono fun _ ⟨h1, h2⟩ ↦ ⟨h1, h2.ne'⟩
lemma ConvexOn.monotoneOn_slope_lt (hfc : ConvexOn 𝕜 s f) (hxs : x ∈ s) :
MonotoneOn (slope f x) {y ∈ s | y < x} :=
(hfc.slope_mono hxs).mono fun _ ⟨h1, h2⟩ ↦ ⟨h1, h2.ne⟩
/-- If `f : 𝕜 → 𝕜` is concave on `s`, then for any point `x ∈ s` the slope of the secant line of `f`
through `x` is antitone on `s \ {x}`. -/
lemma ConcaveOn.slope_anti (hfc : ConcaveOn 𝕜 s f) (hx : x ∈ s) :
AntitoneOn (slope f x) (s \ {x}) := by
rw [← neg_neg f, slope_neg_fun]
exact (ConvexOn.slope_mono hfc.neg hx).neg
lemma ConcaveOn.antitoneOn_slope_gt (hfc : ConcaveOn 𝕜 s f) (hxs : x ∈ s) :
AntitoneOn (slope f x) {y ∈ s | x < y} :=
(hfc.slope_anti hxs).mono fun _ ⟨h1, h2⟩ ↦ ⟨h1, h2.ne'⟩
lemma ConcaveOn.antitoneOn_slope_lt (hfc : ConcaveOn 𝕜 s f) (hxs : x ∈ s) :
AntitoneOn (slope f x) {y ∈ s | y < x} :=
(hfc.slope_anti hxs).mono fun _ ⟨h1, h2⟩ ↦ ⟨h1, h2.ne⟩
variable [TopologicalSpace 𝕜] [OrderTopology 𝕜]
lemma bddBelow_slope_lt_of_mem_interior (hfc : ConvexOn 𝕜 s f) (hxs : x ∈ interior s) :
BddBelow (slope f x '' {y ∈ s | x < y}) := by
obtain ⟨y, hyx, hys⟩ : ∃ y, y < x ∧ y ∈ s :=
Eventually.exists_lt (mem_interior_iff_mem_nhds.mp hxs)
refine bddBelow_iff_subset_Ici.mpr ⟨slope f x y, fun y' ⟨z, hz, hz'⟩ ↦ ?_⟩
simp_rw [mem_Ici, ← hz']
refine hfc.slope_mono (interior_subset hxs) ?_ ?_ (hyx.trans hz.2).le
· simp [hys, hyx.ne]
· simp [hz.2.ne', hz.1]
lemma bddAbove_slope_gt_of_mem_interior (hfc : ConvexOn 𝕜 s f) (hxs : x ∈ interior s) :
BddAbove (slope f x '' {y ∈ s | y < x}) := by
obtain ⟨y, hyx, hys⟩ : ∃ y, x < y ∧ y ∈ s :=
Eventually.exists_gt (mem_interior_iff_mem_nhds.mp hxs)
refine bddAbove_iff_subset_Iic.mpr ⟨slope f x y, fun y' ⟨z, hz, hz'⟩ ↦ ?_⟩
simp_rw [mem_Iic, ← hz']
refine hfc.slope_mono (interior_subset hxs) ?_ ?_ (hz.2.trans hyx).le
· simp [hz.2.ne, hz.1]
· simp [hys, hyx.ne']
end slope
namespace ConvexOn
variable {S : Set ℝ} {f : ℝ → ℝ} {x y f' : ℝ}
section Interior
/-!
### Left and right derivative of a convex function in the interior of the set
-/
lemma hasDerivWithinAt_sInf_slope_of_mem_interior (hfc : ConvexOn ℝ S f) (hxs : x ∈ interior S) :
HasDerivWithinAt f (sInf (slope f x '' {y ∈ S | x < y})) (Ioi x) x := by
have hxs' := hxs
rw [mem_interior_iff_mem_nhds, mem_nhds_iff_exists_Ioo_subset] at hxs'
obtain ⟨a, b, hxab, habs⟩ := hxs'
simp_rw [hasDerivWithinAt_iff_tendsto_slope]
simp only [mem_Ioi, lt_self_iff_false, not_false_eq_true, diff_singleton_eq_self]
have h : Ioo x b ⊆ {y | y ∈ S ∧ x < y} := fun z hz ↦ ⟨habs ⟨hxab.1.trans hz.1, hz.2⟩, hz.1⟩
have h_Ioo : Tendsto (slope f x) (𝓝[>] x) (𝓝 (sInf (slope f x '' Ioo x b))) :=
((monotoneOn_slope_gt hfc (habs hxab)).mono h).tendsto_nhdsWithin_Ioo_right
(by simpa using hxab.2) ((bddBelow_slope_lt_of_mem_interior hfc hxs).mono (image_subset _ h))
suffices sInf (slope f x '' Ioo x b) = sInf (slope f x '' {y ∈ S | x < y}) by rwa [← this]
apply (monotoneOn_slope_gt hfc (habs hxab)).csInf_eq_of_subset_of_forall_exists_le
(bddBelow_slope_lt_of_mem_interior hfc hxs) h ?_
rintro y ⟨hyS, hxy⟩
obtain ⟨z, hxz, hzy⟩ := exists_between (lt_min hxab.2 hxy)
exact ⟨z, ⟨hxz, hzy.trans_le (min_le_left _ _)⟩, hzy.le.trans (min_le_right _ _)⟩
lemma hasDerivWithinAt_sSup_slope_of_mem_interior (hfc : ConvexOn ℝ S f) (hxs : x ∈ interior S) :
HasDerivWithinAt f (sSup (slope f x '' {y ∈ S | y < x})) (Iio x) x := by
have hxs' := hxs
rw [mem_interior_iff_mem_nhds, mem_nhds_iff_exists_Ioo_subset] at hxs'
obtain ⟨a, b, hxab, habs⟩ := hxs'
simp_rw [hasDerivWithinAt_iff_tendsto_slope]
simp only [mem_Iio, lt_self_iff_false, not_false_eq_true, diff_singleton_eq_self]
have h : Ioo a x ⊆ {y | y ∈ S ∧ y < x} := fun z hz ↦ ⟨habs ⟨hz.1, hz.2.trans hxab.2⟩, hz.2⟩
have h_Ioo : Tendsto (slope f x) (𝓝[<] x) (𝓝 (sSup (slope f x '' Ioo a x))) :=
((monotoneOn_slope_lt hfc (habs hxab)).mono h).tendsto_nhdsWithin_Ioo_left
(by simpa using hxab.1) ((bddAbove_slope_gt_of_mem_interior hfc hxs).mono (image_subset _ h))
suffices sSup (slope f x '' Ioo a x) = sSup (slope f x '' {y ∈ S | y < x}) by rwa [← this]
apply (monotoneOn_slope_lt hfc (habs hxab)).csSup_eq_of_subset_of_forall_exists_le
(bddAbove_slope_gt_of_mem_interior hfc hxs) h ?_
rintro y ⟨hyS, hyx⟩
obtain ⟨z, hyz, hzx⟩ := exists_between (max_lt hxab.1 hyx)
exact ⟨z, ⟨(le_max_left _ _).trans_lt hyz, hzx⟩, (le_max_right _ _).trans hyz.le⟩
lemma differentiableWithinAt_Ioi_of_mem_interior (hfc : ConvexOn ℝ S f) (hxs : x ∈ interior S) :
DifferentiableWithinAt ℝ f (Ioi x) x :=
(hfc.hasDerivWithinAt_sInf_slope_of_mem_interior hxs).differentiableWithinAt
lemma differentiableWithinAt_Iio_of_mem_interior (hfc : ConvexOn ℝ S f) (hxs : x ∈ interior S) :
DifferentiableWithinAt ℝ f (Iio x) x :=
(hfc.hasDerivWithinAt_sSup_slope_of_mem_interior hxs).differentiableWithinAt
lemma hasDerivWithinAt_rightDeriv_of_mem_interior (hfc : ConvexOn ℝ S f) (hxs : x ∈ interior S) :
HasDerivWithinAt f (derivWithin f (Ioi x) x) (Ioi x) x :=
(hfc.differentiableWithinAt_Ioi_of_mem_interior hxs).hasDerivWithinAt
lemma hasDerivWithinAt_leftDeriv_of_mem_interior (hfc : ConvexOn ℝ S f) (hxs : x ∈ interior S) :
HasDerivWithinAt f (derivWithin f (Iio x) x) (Iio x) x :=
(hfc.differentiableWithinAt_Iio_of_mem_interior hxs).hasDerivWithinAt
lemma rightDeriv_eq_sInf_slope_of_mem_interior (hfc : ConvexOn ℝ S f) (hxs : x ∈ interior S) :
derivWithin f (Ioi x) x = sInf (slope f x '' {y | y ∈ S ∧ x < y}) :=
(hfc.hasDerivWithinAt_sInf_slope_of_mem_interior hxs).derivWithin (uniqueDiffWithinAt_Ioi x)
lemma leftDeriv_eq_sSup_slope_of_mem_interior (hfc : ConvexOn ℝ S f) (hxs : x ∈ interior S) :
derivWithin f (Iio x) x = sSup (slope f x '' {y | y ∈ S ∧ y < x}) :=
(hfc.hasDerivWithinAt_sSup_slope_of_mem_interior hxs).derivWithin (uniqueDiffWithinAt_Iio x)
lemma monotoneOn_rightDeriv (hfc : ConvexOn ℝ S f) :
MonotoneOn (fun x ↦ derivWithin f (Ioi x) x) (interior S) := by
intro x hxs y hys hxy
rcases eq_or_lt_of_le hxy with rfl | hxy; · rfl
simp_rw [hfc.rightDeriv_eq_sInf_slope_of_mem_interior hxs,
hfc.rightDeriv_eq_sInf_slope_of_mem_interior hys]
refine csInf_le_of_le (b := slope f x y) (bddBelow_slope_lt_of_mem_interior hfc hxs)
⟨y, by simp only [mem_setOf_eq, hxy, and_true]; exact interior_subset hys⟩
(le_csInf ?_ ?_)
· have hys' := hys
rw [mem_interior_iff_mem_nhds, mem_nhds_iff_exists_Ioo_subset] at hys'
obtain ⟨a, b, hxab, habs⟩ := hys'
rw [image_nonempty]
obtain ⟨z, hxz, hzb⟩ := exists_between hxab.2
exact ⟨z, habs ⟨hxab.1.trans hxz, hzb⟩, hxz⟩
· rintro _ ⟨z, ⟨hzs, hyz : y < z⟩, rfl⟩
rw [slope_comm]
exact slope_mono hfc (interior_subset hys) ⟨interior_subset hxs, hxy.ne⟩ ⟨hzs, hyz.ne'⟩
(hxy.trans hyz).le
lemma monotoneOn_leftDeriv (hfc : ConvexOn ℝ S f) :
MonotoneOn (fun x ↦ derivWithin f (Iio x) x) (interior S) := by
intro x hxs y hys hxy
rcases eq_or_lt_of_le hxy with rfl | hxy; · rfl
simp_rw [hfc.leftDeriv_eq_sSup_slope_of_mem_interior hxs,
hfc.leftDeriv_eq_sSup_slope_of_mem_interior hys]
refine le_csSup_of_le (b := slope f x y) (bddAbove_slope_gt_of_mem_interior hfc hys)
⟨x, by simp only [slope_comm, mem_setOf_eq, hxy, and_true]; exact interior_subset hxs⟩
(csSup_le ?_ ?_)
· have hxs' := hxs
rw [mem_interior_iff_mem_nhds, mem_nhds_iff_exists_Ioo_subset] at hxs'
obtain ⟨a, b, hxab, habs⟩ := hxs'
rw [image_nonempty]
obtain ⟨z, hxz, hzb⟩ := exists_between hxab.1
exact ⟨z, habs ⟨hxz, hzb.trans hxab.2⟩, hzb⟩
· rintro _ ⟨z, ⟨hzs, hyz : z < x⟩, rfl⟩
exact slope_mono hfc (interior_subset hxs) ⟨hzs, hyz.ne⟩ ⟨interior_subset hys, hxy.ne'⟩
(hyz.trans hxy).le
lemma leftDeriv_le_rightDeriv_of_mem_interior (hfc : ConvexOn ℝ S f) (hxs : x ∈ interior S) :
derivWithin f (Iio x) x ≤ derivWithin f (Ioi x) x := by
have hxs' := hxs
rw [mem_interior_iff_mem_nhds, mem_nhds_iff_exists_Ioo_subset] at hxs'
obtain ⟨a, b, hxab, habs⟩ := hxs'
rw [hfc.rightDeriv_eq_sInf_slope_of_mem_interior hxs,
hfc.leftDeriv_eq_sSup_slope_of_mem_interior hxs]
refine csSup_le ?_ ?_
· rw [image_nonempty]
obtain ⟨z, haz, hzx⟩ := exists_between hxab.1
exact ⟨z, habs ⟨haz, hzx.trans hxab.2⟩, hzx⟩
rintro _ ⟨z, ⟨hzs, hzx⟩, rfl⟩
refine le_csInf ?_ ?_
· rw [image_nonempty]
obtain ⟨z, hxz, hzb⟩ := exists_between hxab.2
exact ⟨z, habs ⟨hxab.1.trans hxz, hzb⟩, hxz⟩
rintro _ ⟨y, ⟨hys, hxy⟩, rfl⟩
exact slope_mono hfc (interior_subset hxs) ⟨hzs, hzx.ne⟩ ⟨hys, hxy.ne'⟩ (hzx.trans hxy).le
end Interior
section left
/-!
### Convex functions, derivative at left endpoint of secant
-/
/-- If `f : ℝ → ℝ` is convex on `S` and right-differentiable at `x ∈ S`, then the slope of any
secant line with left endpoint at `x` is bounded below by the right derivative of `f` at `x`. -/
lemma le_slope_of_hasDerivWithinAt_Ioi (hfc : ConvexOn ℝ S f)
(hx : x ∈ S) (hy : y ∈ S) (hxy : x < y) (hf' : HasDerivWithinAt f f' (Ioi x) x) :
f' ≤ slope f x y := by
apply le_of_tendsto <| (hasDerivWithinAt_iff_tendsto_slope' not_mem_Ioi_self).mp hf'
simp_rw [eventually_nhdsWithin_iff, slope_def_field]
filter_upwards [eventually_lt_nhds hxy] with t ht (ht' : x < t)
refine hfc.secant_mono hx (?_ : t ∈ S) hy ht'.ne' hxy.ne' ht.le
exact hfc.1.ordConnected.out hx hy ⟨ht'.le, ht.le⟩
/-- Reformulation of `ConvexOn.le_slope_of_hasDerivWithinAt_Ioi` using `derivWithin`. -/
lemma rightDeriv_le_slope (hfc : ConvexOn ℝ S f) (hx : x ∈ S) (hy : y ∈ S) (hxy : x < y)
(hfd : DifferentiableWithinAt ℝ f (Ioi x) x) :
derivWithin f (Ioi x) x ≤ slope f x y :=
le_slope_of_hasDerivWithinAt_Ioi hfc hx hy hxy hfd.hasDerivWithinAt
@[deprecated (since := "2025-01-26")]
alias right_deriv_le_slope := rightDeriv_le_slope
lemma rightDeriv_le_slope_of_mem_interior (hfc : ConvexOn ℝ S f)
{y : ℝ} (hxs : x ∈ interior S) (hys : y ∈ S) (hxy : x < y) :
derivWithin f (Ioi x) x ≤ slope f x y :=
rightDeriv_le_slope hfc (interior_subset hxs) hys hxy
(differentiableWithinAt_Ioi_of_mem_interior hfc hxs)
/-- If `f : ℝ → ℝ` is convex on `S` and differentiable within `S` at `x`, then the slope of any
secant line with left endpoint at `x` is bounded below by the derivative of `f` within `S` at `x`.
This is fractionally weaker than `ConvexOn.le_slope_of_hasDerivWithinAt_Ioi` but simpler to apply
under a `DifferentiableOn S` hypothesis. -/
lemma le_slope_of_hasDerivWithinAt (hfc : ConvexOn ℝ S f) (hx : x ∈ S) (hy : y ∈ S) (hxy : x < y)
(hf' : HasDerivWithinAt f f' S x) :
f' ≤ slope f x y :=
hfc.le_slope_of_hasDerivWithinAt_Ioi hx hy hxy <|
hf'.mono_of_mem_nhdsWithin <| hfc.1.ordConnected.mem_nhdsGT hx hy hxy
/-- Reformulation of `ConvexOn.le_slope_of_hasDerivWithinAt` using `derivWithin`. -/
lemma derivWithin_le_slope (hfc : ConvexOn ℝ S f) (hx : x ∈ S) (hy : y ∈ S) (hxy : x < y)
(hfd : DifferentiableWithinAt ℝ f S x) :
derivWithin f S x ≤ slope f x y :=
le_slope_of_hasDerivWithinAt hfc hx hy hxy hfd.hasDerivWithinAt
/-- If `f : ℝ → ℝ` is convex on `S` and differentiable at `x ∈ S`, then the slope of any secant
line with left endpoint at `x` is bounded below by the derivative of `f` at `x`. -/
lemma le_slope_of_hasDerivAt (hfc : ConvexOn ℝ S f) (hx : x ∈ S) (hy : y ∈ S) (hxy : x < y)
(ha : HasDerivAt f f' x) :
f' ≤ slope f x y :=
hfc.le_slope_of_hasDerivWithinAt_Ioi hx hy hxy ha.hasDerivWithinAt
/-- Reformulation of `ConvexOn.le_slope_of_hasDerivAt` using `deriv` -/
lemma deriv_le_slope (hfc : ConvexOn ℝ S f) (hx : x ∈ S) (hy : y ∈ S) (hxy : x < y)
(hfd : DifferentiableAt ℝ f x) :
deriv f x ≤ slope f x y :=
le_slope_of_hasDerivAt hfc hx hy hxy hfd.hasDerivAt
end left
section right
/-!
### Convex functions, derivative at right endpoint of secant
-/
/-- If `f : ℝ → ℝ` is convex on `S` and left-differentiable at `y ∈ S`, then the slope of any secant
line with right endpoint at `y` is bounded above by the left derivative of `f` at `y`. -/
lemma slope_le_of_hasDerivWithinAt_Iio (hfc : ConvexOn ℝ S f)
(hx : x ∈ S) (hy : y ∈ S) (hxy : x < y) (hf' : HasDerivWithinAt f f' (Iio y) y) :
slope f x y ≤ f' := by
apply ge_of_tendsto <| (hasDerivWithinAt_iff_tendsto_slope' not_mem_Iio_self).mp hf'
simp_rw [eventually_nhdsWithin_iff, slope_comm f x y, slope_def_field]
filter_upwards [eventually_gt_nhds hxy] with t ht (ht' : t < y)
refine hfc.secant_mono hy hx (?_ : t ∈ S) hxy.ne ht'.ne ht.le
exact hfc.1.ordConnected.out hx hy ⟨ht.le, ht'.le⟩
/-- Reformulation of `ConvexOn.slope_le_of_hasDerivWithinAt_Iio` using `derivWithin`. -/
lemma slope_le_leftDeriv (hfc : ConvexOn ℝ S f) (hx : x ∈ S) (hy : y ∈ S) (hxy : x < y)
(hfd : DifferentiableWithinAt ℝ f (Iio y) y) :
slope f x y ≤ derivWithin f (Iio y) y :=
hfc.slope_le_of_hasDerivWithinAt_Iio hx hy hxy hfd.hasDerivWithinAt
@[deprecated (since := "2025-01-26")]
alias slope_le_left_deriv := slope_le_leftDeriv
lemma slope_le_leftDeriv_of_mem_interior (hfc : ConvexOn ℝ S f)
(hys : x ∈ S) (hxs : y ∈ interior S) (hxy : x < y) :
slope f x y ≤ derivWithin f (Iio y) y :=
slope_le_leftDeriv hfc hys (interior_subset hxs) hxy
(differentiableWithinAt_Iio_of_mem_interior hfc hxs)
/-- If `f : ℝ → ℝ` is convex on `S` and differentiable within `S` at `y`, then the slope of any
secant line with right endpoint at `y` is bounded above by the derivative of `f` within `S` at `y`.
This is fractionally weaker than `ConvexOn.slope_le_of_hasDerivWithinAt_Iio` but simpler to apply
under a `DifferentiableOn S` hypothesis. -/
lemma slope_le_of_hasDerivWithinAt (hfc : ConvexOn ℝ S f) (hx : x ∈ S) (hy : y ∈ S) (hxy : x < y)
(hf' : HasDerivWithinAt f f' S y) :
slope f x y ≤ f' :=
hfc.slope_le_of_hasDerivWithinAt_Iio hx hy hxy <|
hf'.mono_of_mem_nhdsWithin <| hfc.1.ordConnected.mem_nhdsLT hx hy hxy
/-- Reformulation of `ConvexOn.slope_le_of_hasDerivWithinAt` using `derivWithin`. -/
lemma slope_le_derivWithin (hfc : ConvexOn ℝ S f) (hx : x ∈ S) (hy : y ∈ S) (hxy : x < y)
(hfd : DifferentiableWithinAt ℝ f S y) :
slope f x y ≤ derivWithin f S y :=
hfc.slope_le_of_hasDerivWithinAt hx hy hxy hfd.hasDerivWithinAt
/-- If `f : ℝ → ℝ` is convex on `S` and differentiable at `y ∈ S`, then the slope of any secant
line with right endpoint at `y` is bounded above by the derivative of `f` at `y`. -/
lemma slope_le_of_hasDerivAt (hfc : ConvexOn ℝ S f) (hx : x ∈ S) (hy : y ∈ S) (hxy : x < y)
(hf' : HasDerivAt f f' y) :
slope f x y ≤ f' :=
hfc.slope_le_of_hasDerivWithinAt_Iio hx hy hxy hf'.hasDerivWithinAt
/-- Reformulation of `ConvexOn.slope_le_of_hasDerivAt` using `deriv`. -/
lemma slope_le_deriv (hfc : ConvexOn ℝ S f) (hx : x ∈ S) (hy : y ∈ S) (hxy : x < y)
(hfd : DifferentiableAt ℝ f y) :
slope f x y ≤ deriv f y :=
hfc.slope_le_of_hasDerivAt hx hy hxy hfd.hasDerivAt
end right
/-!
### Convex functions, monotonicity of derivative
-/
/-- If `f` is convex on `S` and differentiable on `S`, then its derivative within `S` is monotone
on `S`. -/
lemma monotoneOn_derivWithin (hfc : ConvexOn ℝ S f) (hfd : DifferentiableOn ℝ f S) :
MonotoneOn (derivWithin f S) S := by
intro x hx y hy hxy
rcases eq_or_lt_of_le hxy with rfl | hxy'
· rfl
exact (hfc.derivWithin_le_slope hx hy hxy' (hfd x hx)).trans
| (hfc.slope_le_derivWithin hx hy hxy' (hfd y hy))
/-- If `f` is convex on `S` and differentiable at all points of `S`, then its derivative is monotone
on `S`. -/
theorem monotoneOn_deriv (hfc : ConvexOn ℝ S f) (hfd : ∀ x ∈ S, DifferentiableAt ℝ f x) :
| Mathlib/Analysis/Convex/Deriv.lean | 683 | 687 |
/-
Copyright (c) 2018 Johannes Hölzl. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johannes Hölzl, Floris van Doorn, Gabriel Ebner, Yury Kudryashov
-/
import Mathlib.Data.Set.Accumulate
import Mathlib.Order.ConditionallyCompleteLattice.Finset
import Mathlib.Order.Interval.Finset.Nat
/-!
# Conditionally complete linear order structure on `ℕ`
In this file we
* define a `ConditionallyCompleteLinearOrderBot` structure on `ℕ`;
* prove a few lemmas about `iSup`/`iInf`/`Set.iUnion`/`Set.iInter` and natural numbers.
-/
assert_not_exists MonoidWithZero
open Set
namespace Nat
open scoped Classical in
noncomputable instance : InfSet ℕ :=
⟨fun s ↦ if h : ∃ n, n ∈ s then @Nat.find (fun n ↦ n ∈ s) _ h else 0⟩
open scoped Classical in
noncomputable instance : SupSet ℕ :=
⟨fun s ↦ if h : ∃ n, ∀ a ∈ s, a ≤ n then @Nat.find (fun n ↦ ∀ a ∈ s, a ≤ n) _ h else 0⟩
open scoped Classical in
theorem sInf_def {s : Set ℕ} (h : s.Nonempty) : sInf s = @Nat.find (fun n ↦ n ∈ s) _ h :=
dif_pos _
open scoped Classical in
theorem sSup_def {s : Set ℕ} (h : ∃ n, ∀ a ∈ s, a ≤ n) :
sSup s = @Nat.find (fun n ↦ ∀ a ∈ s, a ≤ n) _ h :=
dif_pos _
theorem _root_.Set.Infinite.Nat.sSup_eq_zero {s : Set ℕ} (h : s.Infinite) : sSup s = 0 :=
dif_neg fun ⟨n, hn⟩ ↦
let ⟨k, hks, hk⟩ := h.exists_gt n
(hn k hks).not_lt hk
@[simp]
theorem sInf_eq_zero {s : Set ℕ} : sInf s = 0 ↔ 0 ∈ s ∨ s = ∅ := by
cases eq_empty_or_nonempty s with
| inl h => subst h
simp only [or_true, eq_self_iff_true, iInf, InfSet.sInf,
mem_empty_iff_false, exists_false, dif_neg, not_false_iff]
| inr h => simp only [h.ne_empty, or_false, Nat.sInf_def, h, Nat.find_eq_zero]
@[simp]
theorem sInf_empty : sInf ∅ = 0 := by
rw [sInf_eq_zero]
right
rfl
@[simp]
theorem iInf_of_empty {ι : Sort*} [IsEmpty ι] (f : ι → ℕ) : iInf f = 0 := by
rw [iInf_of_isEmpty, sInf_empty]
/-- This combines `Nat.iInf_of_empty` with `ciInf_const`. -/
@[simp]
lemma iInf_const_zero {ι : Sort*} : ⨅ _ : ι, 0 = 0 :=
(isEmpty_or_nonempty ι).elim (fun h ↦ by simp) fun h ↦ sInf_eq_zero.2 <| by simp
theorem sInf_mem {s : Set ℕ} (h : s.Nonempty) : sInf s ∈ s := by
classical
rw [Nat.sInf_def h]
exact Nat.find_spec h
theorem not_mem_of_lt_sInf {s : Set ℕ} {m : ℕ} (hm : m < sInf s) : m ∉ s := by
classical
cases eq_empty_or_nonempty s with
| inl h => subst h; apply not_mem_empty
| inr h => rw [Nat.sInf_def h] at hm; exact Nat.find_min h hm
protected theorem sInf_le {s : Set ℕ} {m : ℕ} (hm : m ∈ s) : sInf s ≤ m := by
classical
rw [Nat.sInf_def ⟨m, hm⟩]
exact Nat.find_min' ⟨m, hm⟩ hm
theorem nonempty_of_pos_sInf {s : Set ℕ} (h : 0 < sInf s) : s.Nonempty := by
by_contra contra
rw [Set.not_nonempty_iff_eq_empty] at contra
have h' : sInf s ≠ 0 := ne_of_gt h
apply h'
rw [Nat.sInf_eq_zero]
right
assumption
theorem nonempty_of_sInf_eq_succ {s : Set ℕ} {k : ℕ} (h : sInf s = k + 1) : s.Nonempty :=
nonempty_of_pos_sInf (h.symm ▸ succ_pos k : sInf s > 0)
theorem eq_Ici_of_nonempty_of_upward_closed {s : Set ℕ} (hs : s.Nonempty)
(hs' : ∀ k₁ k₂ : ℕ, k₁ ≤ k₂ → k₁ ∈ s → k₂ ∈ s) : s = Ici (sInf s) :=
ext fun n ↦ ⟨fun H ↦ Nat.sInf_le H, fun H ↦ hs' (sInf s) n H (sInf_mem hs)⟩
theorem sInf_upward_closed_eq_succ_iff {s : Set ℕ} (hs : ∀ k₁ k₂ : ℕ, k₁ ≤ k₂ → k₁ ∈ s → k₂ ∈ s)
(k : ℕ) : sInf s = k + 1 ↔ k + 1 ∈ s ∧ k ∉ s := by
classical
constructor
· intro H
rw [eq_Ici_of_nonempty_of_upward_closed (nonempty_of_sInf_eq_succ _) hs, H, mem_Ici, mem_Ici]
· exact ⟨le_rfl, k.not_succ_le_self⟩
· exact k
· assumption
· rintro ⟨H, H'⟩
rw [sInf_def (⟨_, H⟩ : s.Nonempty), find_eq_iff]
exact ⟨H, fun n hnk hns ↦ H' <| hs n k (Nat.lt_succ_iff.mp hnk) hns⟩
/-- This instance is necessary, otherwise the lattice operations would be derived via
`ConditionallyCompleteLinearOrderBot` and marked as noncomputable. -/
instance : Lattice ℕ :=
LinearOrder.toLattice
open scoped Classical in
noncomputable instance : ConditionallyCompleteLinearOrderBot ℕ :=
{ (inferInstance : OrderBot ℕ), (LinearOrder.toLattice : Lattice ℕ),
(inferInstance : LinearOrder ℕ) with
le_csSup := fun s a hb ha ↦ by rw [sSup_def hb]; revert a ha; exact @Nat.find_spec _ _ hb
csSup_le := fun s a _ ha ↦ by rw [sSup_def ⟨a, ha⟩]; exact Nat.find_min' _ ha
le_csInf := fun s a hs hb ↦ by
rw [sInf_def hs]; exact hb (@Nat.find_spec (fun n ↦ n ∈ s) _ _)
csInf_le := fun s a _ ha ↦ by rw [sInf_def ⟨a, ha⟩]; exact Nat.find_min' _ ha
csSup_empty := by
simp only [sSup_def, Set.mem_empty_iff_false, forall_const, forall_prop_of_false,
not_false_iff, exists_const]
apply bot_unique (Nat.find_min' _ _)
trivial
csSup_of_not_bddAbove := by
intro s hs
simp only [mem_univ, forall_true_left, sSup,
mem_empty_iff_false, IsEmpty.forall_iff, forall_const, exists_const, dite_true]
rw [dif_neg]
· exact le_antisymm (zero_le _) (find_le trivial)
· exact hs
csInf_of_not_bddBelow := fun s hs ↦ by simp at hs }
theorem sSup_mem {s : Set ℕ} (h₁ : s.Nonempty) (h₂ : BddAbove s) : sSup s ∈ s :=
let ⟨k, hk⟩ := h₂
h₁.csSup_mem ((finite_le_nat k).subset hk)
theorem sInf_add {n : ℕ} {p : ℕ → Prop} (hn : n ≤ sInf { m | p m }) :
sInf { m | p (m + n) } + n = sInf { m | p m } := by
classical
obtain h | ⟨m, hm⟩ := { m | p (m + n) }.eq_empty_or_nonempty
· rw [h, Nat.sInf_empty, zero_add]
obtain hnp | hnp := hn.eq_or_lt
· exact hnp
suffices hp : p (sInf { m | p m } - n + n) from (h.subset hp).elim
rw [Nat.sub_add_cancel hn]
exact csInf_mem (nonempty_of_pos_sInf <| n.zero_le.trans_lt hnp)
| · have hp : ∃ n, n ∈ { m | p m } := ⟨_, hm⟩
rw [Nat.sInf_def ⟨m, hm⟩, Nat.sInf_def hp]
rw [Nat.sInf_def hp] at hn
exact find_add hn
theorem sInf_add' {n : ℕ} {p : ℕ → Prop} (h : 0 < sInf { m | p m }) :
sInf { m | p m } + n = sInf { m | p (m - n) } := by
suffices h₁ : n ≤ sInf {m | p (m - n)} by
convert sInf_add h₁
simp_rw [Nat.add_sub_cancel_right]
obtain ⟨m, hm⟩ := nonempty_of_pos_sInf h
refine
le_csInf ⟨m + n, ?_⟩ fun b hb ↦
| Mathlib/Data/Nat/Lattice.lean | 157 | 169 |
/-
Copyright (c) 2019 Yury Kudryashov. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Yury Kudryashov, Sébastien Gouëzel, Rémy Degenne
-/
import Mathlib.Analysis.Convex.Jensen
import Mathlib.Analysis.Convex.Mul
import Mathlib.Analysis.Convex.SpecificFunctions.Basic
import Mathlib.Analysis.SpecialFunctions.Pow.NNReal
/-!
# Mean value inequalities
In this file we prove several mean inequalities for finite sums. Versions for integrals of some of
these inequalities are available in `MeasureTheory.MeanInequalities`.
## Main theorems: generalized mean inequality
The inequality says that for two non-negative vectors $w$ and $z$ with $\sum_{i\in s} w_i=1$
and $p ≤ q$ we have
$$
\sqrt[p]{\sum_{i\in s} w_i z_i^p} ≤ \sqrt[q]{\sum_{i\in s} w_i z_i^q}.
$$
Currently we only prove this inequality for $p=1$. As in the rest of `Mathlib`, we provide
different theorems for natural exponents (`pow_arith_mean_le_arith_mean_pow`), integer exponents
(`zpow_arith_mean_le_arith_mean_zpow`), and real exponents (`rpow_arith_mean_le_arith_mean_rpow` and
`arith_mean_le_rpow_mean`). In the first two cases we prove
$$
\left(\sum_{i\in s} w_i z_i\right)^n ≤ \sum_{i\in s} w_i z_i^n
$$
in order to avoid using real exponents. For real exponents we prove both this and standard versions.
## TODO
- each inequality `A ≤ B` should come with a theorem `A = B ↔ _`; one of the ways to prove them
is to define `StrictConvexOn` functions.
- generalized mean inequality with any `p ≤ q`, including negative numbers;
- prove that the power mean tends to the geometric mean as the exponent tends to zero.
-/
universe u v
open Finset NNReal ENNReal
noncomputable section
variable {ι : Type u} (s : Finset ι)
namespace Real
theorem pow_arith_mean_le_arith_mean_pow (w z : ι → ℝ) (hw : ∀ i ∈ s, 0 ≤ w i)
(hw' : ∑ i ∈ s, w i = 1) (hz : ∀ i ∈ s, 0 ≤ z i) (n : ℕ) :
(∑ i ∈ s, w i * z i) ^ n ≤ ∑ i ∈ s, w i * z i ^ n :=
(convexOn_pow n).map_sum_le hw hw' hz
theorem pow_arith_mean_le_arith_mean_pow_of_even (w z : ι → ℝ) (hw : ∀ i ∈ s, 0 ≤ w i)
(hw' : ∑ i ∈ s, w i = 1) {n : ℕ} (hn : Even n) :
(∑ i ∈ s, w i * z i) ^ n ≤ ∑ i ∈ s, w i * z i ^ n :=
hn.convexOn_pow.map_sum_le hw hw' fun _ _ => Set.mem_univ _
theorem zpow_arith_mean_le_arith_mean_zpow (w z : ι → ℝ) (hw : ∀ i ∈ s, 0 ≤ w i)
(hw' : ∑ i ∈ s, w i = 1) (hz : ∀ i ∈ s, 0 < z i) (m : ℤ) :
(∑ i ∈ s, w i * z i) ^ m ≤ ∑ i ∈ s, w i * z i ^ m :=
(convexOn_zpow m).map_sum_le hw hw' hz
theorem rpow_arith_mean_le_arith_mean_rpow (w z : ι → ℝ) (hw : ∀ i ∈ s, 0 ≤ w i)
(hw' : ∑ i ∈ s, w i = 1) (hz : ∀ i ∈ s, 0 ≤ z i) {p : ℝ} (hp : 1 ≤ p) :
(∑ i ∈ s, w i * z i) ^ p ≤ ∑ i ∈ s, w i * z i ^ p :=
(convexOn_rpow hp).map_sum_le hw hw' hz
theorem arith_mean_le_rpow_mean (w z : ι → ℝ) (hw : ∀ i ∈ s, 0 ≤ w i) (hw' : ∑ i ∈ s, w i = 1)
(hz : ∀ i ∈ s, 0 ≤ z i) {p : ℝ} (hp : 1 ≤ p) :
∑ i ∈ s, w i * z i ≤ (∑ i ∈ s, w i * z i ^ p) ^ (1 / p) := by
have : 0 < p := by positivity
rw [← rpow_le_rpow_iff _ _ this, ← rpow_mul, one_div_mul_cancel (ne_of_gt this), rpow_one]
· exact rpow_arith_mean_le_arith_mean_rpow s w z hw hw' hz hp
all_goals
apply_rules [sum_nonneg, rpow_nonneg]
intro i hi
apply_rules [mul_nonneg, rpow_nonneg, hw i hi, hz i hi]
end Real
namespace NNReal
/-- Weighted generalized mean inequality, version sums over finite sets, with `ℝ≥0`-valued
functions and natural exponent. -/
theorem pow_arith_mean_le_arith_mean_pow (w z : ι → ℝ≥0) (hw' : ∑ i ∈ s, w i = 1) (n : ℕ) :
(∑ i ∈ s, w i * z i) ^ n ≤ ∑ i ∈ s, w i * z i ^ n :=
mod_cast
Real.pow_arith_mean_le_arith_mean_pow s _ _ (fun i _ => (w i).coe_nonneg)
(mod_cast hw') (fun i _ => (z i).coe_nonneg) n
/-- Weighted generalized mean inequality, version for sums over finite sets, with `ℝ≥0`-valued
functions and real exponents. -/
theorem rpow_arith_mean_le_arith_mean_rpow (w z : ι → ℝ≥0) (hw' : ∑ i ∈ s, w i = 1) {p : ℝ}
(hp : 1 ≤ p) : (∑ i ∈ s, w i * z i) ^ p ≤ ∑ i ∈ s, w i * z i ^ p :=
mod_cast
Real.rpow_arith_mean_le_arith_mean_rpow s _ _ (fun i _ => (w i).coe_nonneg)
(mod_cast hw') (fun i _ => (z i).coe_nonneg) hp
/-- Weighted generalized mean inequality, version for two elements of `ℝ≥0` and real exponents. -/
theorem rpow_arith_mean_le_arith_mean2_rpow (w₁ w₂ z₁ z₂ : ℝ≥0) (hw' : w₁ + w₂ = 1) {p : ℝ}
(hp : 1 ≤ p) : (w₁ * z₁ + w₂ * z₂) ^ p ≤ w₁ * z₁ ^ p + w₂ * z₂ ^ p := by
have h := rpow_arith_mean_le_arith_mean_rpow univ ![w₁, w₂] ![z₁, z₂] ?_ hp
· simpa [Fin.sum_univ_succ] using h
· simp [hw', Fin.sum_univ_succ]
/-- Unweighted mean inequality, version for two elements of `ℝ≥0` and real exponents. -/
theorem rpow_add_le_mul_rpow_add_rpow (z₁ z₂ : ℝ≥0) {p : ℝ} (hp : 1 ≤ p) :
(z₁ + z₂) ^ p ≤ (2 : ℝ≥0) ^ (p - 1) * (z₁ ^ p + z₂ ^ p) := by
rcases eq_or_lt_of_le hp with (rfl | h'p)
· simp only [rpow_one, sub_self, rpow_zero, one_mul]; rfl
convert rpow_arith_mean_le_arith_mean2_rpow (1 / 2) (1 / 2) (2 * z₁) (2 * z₂) (add_halves 1) hp
using 1
· simp only [one_div, inv_mul_cancel_left₀, Ne, mul_eq_zero, two_ne_zero, one_ne_zero,
not_false_iff]
· have A : p - 1 ≠ 0 := ne_of_gt (sub_pos.2 h'p)
simp only [mul_rpow, rpow_sub' A, div_eq_inv_mul, rpow_one, mul_one]
ring
/-- Weighted generalized mean inequality, version for sums over finite sets, with `ℝ≥0`-valued
functions and real exponents. -/
theorem arith_mean_le_rpow_mean (w z : ι → ℝ≥0) (hw' : ∑ i ∈ s, w i = 1) {p : ℝ} (hp : 1 ≤ p) :
∑ i ∈ s, w i * z i ≤ (∑ i ∈ s, w i * z i ^ p) ^ (1 / p) :=
mod_cast
Real.arith_mean_le_rpow_mean s _ _ (fun i _ => (w i).coe_nonneg) (mod_cast hw')
(fun i _ => (z i).coe_nonneg) hp
private theorem add_rpow_le_one_of_add_le_one {p : ℝ} (a b : ℝ≥0) (hab : a + b ≤ 1) (hp1 : 1 ≤ p) :
a ^ p + b ^ p ≤ 1 := by
have h_le_one : ∀ x : ℝ≥0, x ≤ 1 → x ^ p ≤ x := fun x hx => rpow_le_self_of_le_one hx hp1
have ha : a ≤ 1 := (self_le_add_right a b).trans hab
have hb : b ≤ 1 := (self_le_add_left b a).trans hab
exact (add_le_add (h_le_one a ha) (h_le_one b hb)).trans hab
theorem add_rpow_le_rpow_add {p : ℝ} (a b : ℝ≥0) (hp1 : 1 ≤ p) : a ^ p + b ^ p ≤ (a + b) ^ p := by
have hp_pos : 0 < p := by positivity
by_cases h_zero : a + b = 0
· simp [add_eq_zero.mp h_zero, hp_pos.ne']
have h_nonzero : ¬(a = 0 ∧ b = 0) := by rwa [add_eq_zero] at h_zero
have h_add : a / (a + b) + b / (a + b) = 1 := by rw [div_add_div_same, div_self h_zero]
have h := add_rpow_le_one_of_add_le_one (a / (a + b)) (b / (a + b)) h_add.le hp1
rw [div_rpow a (a + b), div_rpow b (a + b)] at h
have hab_0 : (a + b) ^ p ≠ 0 := by simp [hp_pos, h_nonzero]
have hab_0' : 0 < (a + b) ^ p := zero_lt_iff.mpr hab_0
have h_mul : (a + b) ^ p * (a ^ p / (a + b) ^ p + b ^ p / (a + b) ^ p) ≤ (a + b) ^ p := by
nth_rw 4 [← mul_one ((a + b) ^ p)]
exact (mul_le_mul_left hab_0').mpr h
rwa [div_eq_mul_inv, div_eq_mul_inv, mul_add, mul_comm (a ^ p), mul_comm (b ^ p), ← mul_assoc, ←
mul_assoc, mul_inv_cancel₀ hab_0, one_mul, one_mul] at h_mul
theorem rpow_add_rpow_le_add {p : ℝ} (a b : ℝ≥0) (hp1 : 1 ≤ p) :
(a ^ p + b ^ p) ^ (1 / p) ≤ a + b := by
rw [one_div]
rw [← @NNReal.le_rpow_inv_iff _ _ p⁻¹ (by simp [lt_of_lt_of_le zero_lt_one hp1])]
rw [inv_inv]
exact add_rpow_le_rpow_add _ _ hp1
theorem rpow_add_rpow_le {p q : ℝ} (a b : ℝ≥0) (hp_pos : 0 < p) (hpq : p ≤ q) :
(a ^ q + b ^ q) ^ (1 / q) ≤ (a ^ p + b ^ p) ^ (1 / p) := by
have h_rpow : ∀ a : ℝ≥0, a ^ q = (a ^ p) ^ (q / p) := fun a => by
rw [← NNReal.rpow_mul, div_eq_inv_mul, ← mul_assoc, mul_inv_cancel₀ hp_pos.ne.symm,
one_mul]
have h_rpow_add_rpow_le_add :
((a ^ p) ^ (q / p) + (b ^ p) ^ (q / p)) ^ (1 / (q / p)) ≤ a ^ p + b ^ p := by
refine rpow_add_rpow_le_add (a ^ p) (b ^ p) ?_
rwa [one_le_div hp_pos]
rw [h_rpow a, h_rpow b, one_div p, NNReal.le_rpow_inv_iff hp_pos, ← NNReal.rpow_mul, mul_comm,
mul_one_div]
rwa [one_div_div] at h_rpow_add_rpow_le_add
theorem rpow_add_le_add_rpow {p : ℝ} (a b : ℝ≥0) (hp : 0 ≤ p) (hp1 : p ≤ 1) :
(a + b) ^ p ≤ a ^ p + b ^ p := by
rcases hp.eq_or_lt with (rfl | hp_pos)
· simp
have h := rpow_add_rpow_le a b hp_pos hp1
rw [one_div_one, one_div] at h
repeat' rw [NNReal.rpow_one] at h
exact (NNReal.le_rpow_inv_iff hp_pos).mp h
end NNReal
namespace Real
lemma add_rpow_le_rpow_add {p : ℝ} {a b : ℝ} (ha : 0 ≤ a) (hb : 0 ≤ b) (hp1 : 1 ≤ p) :
a ^ p + b ^ p ≤ (a + b) ^ p := by
lift a to NNReal using ha
lift b to NNReal using hb
exact_mod_cast NNReal.add_rpow_le_rpow_add a b hp1
lemma rpow_add_rpow_le_add {p : ℝ} {a b : ℝ} (ha : 0 ≤ a) (hb : 0 ≤ b) (hp1 : 1 ≤ p) :
(a ^ p + b ^ p) ^ (1 / p) ≤ a + b := by
lift a to NNReal using ha
lift b to NNReal using hb
exact_mod_cast NNReal.rpow_add_rpow_le_add a b hp1
lemma rpow_add_rpow_le {p q : ℝ} {a b : ℝ} (ha : 0 ≤ a) (hb : 0 ≤ b) (hp_pos : 0 < p)
(hpq : p ≤ q) :
| (a ^ q + b ^ q) ^ (1 / q) ≤ (a ^ p + b ^ p) ^ (1 / p) := by
lift a to NNReal using ha
lift b to NNReal using hb
exact_mod_cast NNReal.rpow_add_rpow_le a b hp_pos hpq
lemma rpow_add_le_add_rpow {p : ℝ} {a b : ℝ} (ha : 0 ≤ a) (hb : 0 ≤ b) (hp : 0 ≤ p)
(hp1 : p ≤ 1) :
(a + b) ^ p ≤ a ^ p + b ^ p := by
lift a to NNReal using ha
lift b to NNReal using hb
exact_mod_cast NNReal.rpow_add_le_add_rpow a b hp hp1
| Mathlib/Analysis/MeanInequalitiesPow.lean | 203 | 214 |
/-
Copyright (c) 2014 Jeremy Avigad. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Jeremy Avigad, Leonardo de Moura
-/
import Batteries.Tactic.Congr
import Mathlib.Data.Option.Basic
import Mathlib.Data.Prod.Basic
import Mathlib.Data.Set.Subsingleton
import Mathlib.Data.Set.SymmDiff
import Mathlib.Data.Set.Inclusion
/-!
# Images and preimages of sets
## Main definitions
* `preimage f t : Set α` : the preimage f⁻¹(t) (written `f ⁻¹' t` in Lean) of a subset of β.
* `range f : Set β` : the image of `univ` under `f`.
Also works for `{p : Prop} (f : p → α)` (unlike `image`)
## Notation
* `f ⁻¹' t` for `Set.preimage f t`
* `f '' s` for `Set.image f s`
## Tags
set, sets, image, preimage, pre-image, range
-/
assert_not_exists WithTop OrderIso
universe u v
open Function Set
namespace Set
variable {α β γ : Type*} {ι : Sort*}
/-! ### Inverse image -/
section Preimage
variable {f : α → β} {g : β → γ}
@[simp]
theorem preimage_empty : f ⁻¹' ∅ = ∅ :=
rfl
theorem preimage_congr {f g : α → β} {s : Set β} (h : ∀ x : α, f x = g x) : f ⁻¹' s = g ⁻¹' s := by
congr with x
simp [h]
@[gcongr]
theorem preimage_mono {s t : Set β} (h : s ⊆ t) : f ⁻¹' s ⊆ f ⁻¹' t := fun _ hx => h hx
@[simp, mfld_simps]
theorem preimage_univ : f ⁻¹' univ = univ :=
rfl
theorem subset_preimage_univ {s : Set α} : s ⊆ f ⁻¹' univ :=
subset_univ _
@[simp, mfld_simps]
theorem preimage_inter {s t : Set β} : f ⁻¹' (s ∩ t) = f ⁻¹' s ∩ f ⁻¹' t :=
rfl
@[simp]
theorem preimage_union {s t : Set β} : f ⁻¹' (s ∪ t) = f ⁻¹' s ∪ f ⁻¹' t :=
rfl
@[simp]
theorem preimage_compl {s : Set β} : f ⁻¹' sᶜ = (f ⁻¹' s)ᶜ :=
rfl
@[simp]
theorem preimage_diff (f : α → β) (s t : Set β) : f ⁻¹' (s \ t) = f ⁻¹' s \ f ⁻¹' t :=
rfl
open scoped symmDiff in
@[simp]
lemma preimage_symmDiff {f : α → β} (s t : Set β) : f ⁻¹' (s ∆ t) = (f ⁻¹' s) ∆ (f ⁻¹' t) :=
rfl
@[simp]
theorem preimage_ite (f : α → β) (s t₁ t₂ : Set β) :
f ⁻¹' s.ite t₁ t₂ = (f ⁻¹' s).ite (f ⁻¹' t₁) (f ⁻¹' t₂) :=
rfl
@[simp]
theorem preimage_setOf_eq {p : α → Prop} {f : β → α} : f ⁻¹' { a | p a } = { a | p (f a) } :=
rfl
@[simp]
theorem preimage_id_eq : preimage (id : α → α) = id :=
rfl
@[mfld_simps]
theorem preimage_id {s : Set α} : id ⁻¹' s = s :=
rfl
@[simp, mfld_simps]
theorem preimage_id' {s : Set α} : (fun x => x) ⁻¹' s = s :=
rfl
@[simp]
theorem preimage_const_of_mem {b : β} {s : Set β} (h : b ∈ s) : (fun _ : α => b) ⁻¹' s = univ :=
eq_univ_of_forall fun _ => h
@[simp]
theorem preimage_const_of_not_mem {b : β} {s : Set β} (h : b ∉ s) : (fun _ : α => b) ⁻¹' s = ∅ :=
eq_empty_of_subset_empty fun _ hx => h hx
theorem preimage_const (b : β) (s : Set β) [Decidable (b ∈ s)] :
(fun _ : α => b) ⁻¹' s = if b ∈ s then univ else ∅ := by
split_ifs with hb
exacts [preimage_const_of_mem hb, preimage_const_of_not_mem hb]
/-- If preimage of each singleton under `f : α → β` is either empty or the whole type,
then `f` is a constant. -/
lemma exists_eq_const_of_preimage_singleton [Nonempty β] {f : α → β}
(hf : ∀ b : β, f ⁻¹' {b} = ∅ ∨ f ⁻¹' {b} = univ) : ∃ b, f = const α b := by
rcases em (∃ b, f ⁻¹' {b} = univ) with ⟨b, hb⟩ | hf'
· exact ⟨b, funext fun x ↦ eq_univ_iff_forall.1 hb x⟩
· have : ∀ x b, f x ≠ b := fun x b ↦
eq_empty_iff_forall_not_mem.1 ((hf b).resolve_right fun h ↦ hf' ⟨b, h⟩) x
exact ⟨Classical.arbitrary β, funext fun x ↦ absurd rfl (this x _)⟩
theorem preimage_comp {s : Set γ} : g ∘ f ⁻¹' s = f ⁻¹' (g ⁻¹' s) :=
rfl
theorem preimage_comp_eq : preimage (g ∘ f) = preimage f ∘ preimage g :=
rfl
theorem preimage_iterate_eq {f : α → α} {n : ℕ} : Set.preimage f^[n] = (Set.preimage f)^[n] := by
induction n with
| zero => simp
| succ n ih => rw [iterate_succ, iterate_succ', preimage_comp_eq, ih]
theorem preimage_preimage {g : β → γ} {f : α → β} {s : Set γ} :
f ⁻¹' (g ⁻¹' s) = (fun x => g (f x)) ⁻¹' s :=
preimage_comp.symm
theorem eq_preimage_subtype_val_iff {p : α → Prop} {s : Set (Subtype p)} {t : Set α} :
s = Subtype.val ⁻¹' t ↔ ∀ (x) (h : p x), (⟨x, h⟩ : Subtype p) ∈ s ↔ x ∈ t :=
⟨fun s_eq x h => by
rw [s_eq]
simp, fun h => ext fun ⟨x, hx⟩ => by simp [h]⟩
theorem nonempty_of_nonempty_preimage {s : Set β} {f : α → β} (hf : (f ⁻¹' s).Nonempty) :
s.Nonempty :=
let ⟨x, hx⟩ := hf
⟨f x, hx⟩
@[simp] theorem preimage_singleton_true (p : α → Prop) : p ⁻¹' {True} = {a | p a} := by ext; simp
@[simp] theorem preimage_singleton_false (p : α → Prop) : p ⁻¹' {False} = {a | ¬p a} := by ext; simp
theorem preimage_subtype_coe_eq_compl {s u v : Set α} (hsuv : s ⊆ u ∪ v)
(H : s ∩ (u ∩ v) = ∅) : ((↑) : s → α) ⁻¹' u = ((↑) ⁻¹' v)ᶜ := by
ext ⟨x, x_in_s⟩
constructor
· intro x_in_u x_in_v
exact eq_empty_iff_forall_not_mem.mp H x ⟨x_in_s, ⟨x_in_u, x_in_v⟩⟩
· intro hx
exact Or.elim (hsuv x_in_s) id fun hx' => hx.elim hx'
lemma preimage_subset {s t} (hs : s ⊆ f '' t) (hf : Set.InjOn f (f ⁻¹' s)) : f ⁻¹' s ⊆ t := by
rintro a ha
obtain ⟨b, hb, hba⟩ := hs ha
rwa [hf ha _ hba.symm]
simpa [hba]
end Preimage
/-! ### Image of a set under a function -/
section Image
variable {f : α → β} {s t : Set α}
theorem image_eta (f : α → β) : f '' s = (fun x => f x) '' s :=
rfl
theorem _root_.Function.Injective.mem_set_image {f : α → β} (hf : Injective f) {s : Set α} {a : α} :
f a ∈ f '' s ↔ a ∈ s :=
⟨fun ⟨_, hb, Eq⟩ => hf Eq ▸ hb, mem_image_of_mem f⟩
lemma preimage_subset_of_surjOn {t : Set β} (hf : Injective f) (h : SurjOn f s t) :
f ⁻¹' t ⊆ s := fun _ hx ↦
hf.mem_set_image.1 <| h hx
theorem forall_mem_image {f : α → β} {s : Set α} {p : β → Prop} :
(∀ y ∈ f '' s, p y) ↔ ∀ ⦃x⦄, x ∈ s → p (f x) := by simp
theorem exists_mem_image {f : α → β} {s : Set α} {p : β → Prop} :
(∃ y ∈ f '' s, p y) ↔ ∃ x ∈ s, p (f x) := by simp
@[congr]
theorem image_congr {f g : α → β} {s : Set α} (h : ∀ a ∈ s, f a = g a) : f '' s = g '' s := by
aesop
/-- A common special case of `image_congr` -/
theorem image_congr' {f g : α → β} {s : Set α} (h : ∀ x : α, f x = g x) : f '' s = g '' s :=
image_congr fun x _ => h x
@[gcongr]
lemma image_mono (h : s ⊆ t) : f '' s ⊆ f '' t := by
rintro - ⟨a, ha, rfl⟩; exact mem_image_of_mem f (h ha)
theorem image_comp (f : β → γ) (g : α → β) (a : Set α) : f ∘ g '' a = f '' (g '' a) := by aesop
theorem image_comp_eq {g : β → γ} : image (g ∘ f) = image g ∘ image f := by ext; simp
/-- A variant of `image_comp`, useful for rewriting -/
theorem image_image (g : β → γ) (f : α → β) (s : Set α) : g '' (f '' s) = (fun x => g (f x)) '' s :=
(image_comp g f s).symm
theorem image_comm {β'} {f : β → γ} {g : α → β} {f' : α → β'} {g' : β' → γ}
(h_comm : ∀ a, f (g a) = g' (f' a)) : (s.image g).image f = (s.image f').image g' := by
simp_rw [image_image, h_comm]
theorem _root_.Function.Semiconj.set_image {f : α → β} {ga : α → α} {gb : β → β}
(h : Function.Semiconj f ga gb) : Function.Semiconj (image f) (image ga) (image gb) := fun _ =>
image_comm h
theorem _root_.Function.Commute.set_image {f g : α → α} (h : Function.Commute f g) :
Function.Commute (image f) (image g) :=
Function.Semiconj.set_image h
/-- Image is monotone with respect to `⊆`. See `Set.monotone_image` for the statement in
terms of `≤`. -/
@[gcongr]
theorem image_subset {a b : Set α} (f : α → β) (h : a ⊆ b) : f '' a ⊆ f '' b := by
simp only [subset_def, mem_image]
exact fun x => fun ⟨w, h1, h2⟩ => ⟨w, h h1, h2⟩
/-- `Set.image` is monotone. See `Set.image_subset` for the statement in terms of `⊆`. -/
lemma monotone_image {f : α → β} : Monotone (image f) := fun _ _ => image_subset _
theorem image_union (f : α → β) (s t : Set α) : f '' (s ∪ t) = f '' s ∪ f '' t :=
ext fun x =>
⟨by rintro ⟨a, h | h, rfl⟩ <;> [left; right] <;> exact ⟨_, h, rfl⟩, by
rintro (⟨a, h, rfl⟩ | ⟨a, h, rfl⟩) <;> refine ⟨_, ?_, rfl⟩
· exact mem_union_left t h
· exact mem_union_right s h⟩
@[simp]
theorem image_empty (f : α → β) : f '' ∅ = ∅ := by
ext
simp
theorem image_inter_subset (f : α → β) (s t : Set α) : f '' (s ∩ t) ⊆ f '' s ∩ f '' t :=
subset_inter (image_subset _ inter_subset_left) (image_subset _ inter_subset_right)
theorem image_inter_on {f : α → β} {s t : Set α} (h : ∀ x ∈ t, ∀ y ∈ s, f x = f y → x = y) :
f '' (s ∩ t) = f '' s ∩ f '' t :=
(image_inter_subset _ _ _).antisymm
fun b ⟨⟨a₁, ha₁, h₁⟩, ⟨a₂, ha₂, h₂⟩⟩ ↦
have : a₂ = a₁ := h _ ha₂ _ ha₁ (by simp [*])
⟨a₁, ⟨ha₁, this ▸ ha₂⟩, h₁⟩
theorem image_inter {f : α → β} {s t : Set α} (H : Injective f) : f '' (s ∩ t) = f '' s ∩ f '' t :=
image_inter_on fun _ _ _ _ h => H h
theorem image_univ_of_surjective {ι : Type*} {f : ι → β} (H : Surjective f) : f '' univ = univ :=
eq_univ_of_forall <| by simpa [image]
@[simp]
theorem image_singleton {f : α → β} {a : α} : f '' {a} = {f a} := by
ext
simp [image, eq_comm]
@[simp]
theorem Nonempty.image_const {s : Set α} (hs : s.Nonempty) (a : β) : (fun _ => a) '' s = {a} :=
ext fun _ =>
⟨fun ⟨_, _, h⟩ => h ▸ mem_singleton _, fun h =>
(eq_of_mem_singleton h).symm ▸ hs.imp fun _ hy => ⟨hy, rfl⟩⟩
@[simp, mfld_simps]
theorem image_eq_empty {α β} {f : α → β} {s : Set α} : f '' s = ∅ ↔ s = ∅ := by
simp only [eq_empty_iff_forall_not_mem]
exact ⟨fun H a ha => H _ ⟨_, ha, rfl⟩, fun H b ⟨_, ha, _⟩ => H _ ha⟩
theorem preimage_compl_eq_image_compl [BooleanAlgebra α] (S : Set α) :
HasCompl.compl ⁻¹' S = HasCompl.compl '' S :=
Set.ext fun x =>
⟨fun h => ⟨xᶜ, h, compl_compl x⟩, fun h =>
Exists.elim h fun _ hy => (compl_eq_comm.mp hy.2).symm.subst hy.1⟩
theorem mem_compl_image [BooleanAlgebra α] (t : α) (S : Set α) :
t ∈ HasCompl.compl '' S ↔ tᶜ ∈ S := by
simp [← preimage_compl_eq_image_compl]
@[simp]
theorem image_id_eq : image (id : α → α) = id := by ext; simp
/-- A variant of `image_id` -/
@[simp]
theorem image_id' (s : Set α) : (fun x => x) '' s = s := by
ext
simp
theorem image_id (s : Set α) : id '' s = s := by simp
lemma image_iterate_eq {f : α → α} {n : ℕ} : image (f^[n]) = (image f)^[n] := by
induction n with
| zero => simp
| succ n ih => rw [iterate_succ', iterate_succ', ← ih, image_comp_eq]
theorem compl_compl_image [BooleanAlgebra α] (S : Set α) :
HasCompl.compl '' (HasCompl.compl '' S) = S := by
rw [← image_comp, compl_comp_compl, image_id]
theorem image_insert_eq {f : α → β} {a : α} {s : Set α} :
f '' insert a s = insert (f a) (f '' s) := by
ext
simp [and_or_left, exists_or, eq_comm, or_comm, and_comm]
theorem image_pair (f : α → β) (a b : α) : f '' {a, b} = {f a, f b} := by
simp only [image_insert_eq, image_singleton]
theorem image_subset_preimage_of_inverse {f : α → β} {g : β → α} (I : LeftInverse g f) (s : Set α) :
f '' s ⊆ g ⁻¹' s := fun _ ⟨a, h, e⟩ => e ▸ ((I a).symm ▸ h : g (f a) ∈ s)
theorem preimage_subset_image_of_inverse {f : α → β} {g : β → α} (I : LeftInverse g f) (s : Set β) :
f ⁻¹' s ⊆ g '' s := fun b h => ⟨f b, h, I b⟩
theorem range_inter_ssubset_iff_preimage_ssubset {f : α → β} {S S' : Set β} :
range f ∩ S ⊂ range f ∩ S' ↔ f ⁻¹' S ⊂ f ⁻¹' S' := by
simp only [Set.ssubset_iff_exists]
apply and_congr ?_ (by aesop)
constructor
all_goals
intro r x hx
simp_all only [subset_inter_iff, inter_subset_left, true_and, mem_preimage,
mem_inter_iff, mem_range, true_and]
aesop
theorem image_eq_preimage_of_inverse {f : α → β} {g : β → α} (h₁ : LeftInverse g f)
(h₂ : RightInverse g f) : image f = preimage g :=
funext fun s =>
Subset.antisymm (image_subset_preimage_of_inverse h₁ s) (preimage_subset_image_of_inverse h₂ s)
theorem mem_image_iff_of_inverse {f : α → β} {g : β → α} {b : β} {s : Set α} (h₁ : LeftInverse g f)
(h₂ : RightInverse g f) : b ∈ f '' s ↔ g b ∈ s := by
rw [image_eq_preimage_of_inverse h₁ h₂]; rfl
theorem image_compl_subset {f : α → β} {s : Set α} (H : Injective f) : f '' sᶜ ⊆ (f '' s)ᶜ :=
Disjoint.subset_compl_left <| by simp [disjoint_iff_inf_le, ← image_inter H]
theorem subset_image_compl {f : α → β} {s : Set α} (H : Surjective f) : (f '' s)ᶜ ⊆ f '' sᶜ :=
compl_subset_iff_union.2 <| by
rw [← image_union]
simp [image_univ_of_surjective H]
theorem image_compl_eq {f : α → β} {s : Set α} (H : Bijective f) : f '' sᶜ = (f '' s)ᶜ :=
Subset.antisymm (image_compl_subset H.1) (subset_image_compl H.2)
theorem subset_image_diff (f : α → β) (s t : Set α) : f '' s \ f '' t ⊆ f '' (s \ t) := by
rw [diff_subset_iff, ← image_union, union_diff_self]
exact image_subset f subset_union_right
open scoped symmDiff in
theorem subset_image_symmDiff : (f '' s) ∆ (f '' t) ⊆ f '' s ∆ t :=
(union_subset_union (subset_image_diff _ _ _) <| subset_image_diff _ _ _).trans
(superset_of_eq (image_union _ _ _))
theorem image_diff {f : α → β} (hf : Injective f) (s t : Set α) : f '' (s \ t) = f '' s \ f '' t :=
Subset.antisymm
(Subset.trans (image_inter_subset _ _ _) <| inter_subset_inter_right _ <| image_compl_subset hf)
(subset_image_diff f s t)
open scoped symmDiff in
theorem image_symmDiff (hf : Injective f) (s t : Set α) : f '' s ∆ t = (f '' s) ∆ (f '' t) := by
simp_rw [Set.symmDiff_def, image_union, image_diff hf]
theorem Nonempty.image (f : α → β) {s : Set α} : s.Nonempty → (f '' s).Nonempty
| ⟨x, hx⟩ => ⟨f x, mem_image_of_mem f hx⟩
theorem Nonempty.of_image {f : α → β} {s : Set α} : (f '' s).Nonempty → s.Nonempty
| ⟨_, x, hx, _⟩ => ⟨x, hx⟩
@[simp]
theorem image_nonempty {f : α → β} {s : Set α} : (f '' s).Nonempty ↔ s.Nonempty :=
⟨Nonempty.of_image, fun h => h.image f⟩
theorem Nonempty.preimage {s : Set β} (hs : s.Nonempty) {f : α → β} (hf : Surjective f) :
(f ⁻¹' s).Nonempty :=
let ⟨y, hy⟩ := hs
let ⟨x, hx⟩ := hf y
⟨x, mem_preimage.2 <| hx.symm ▸ hy⟩
instance (f : α → β) (s : Set α) [Nonempty s] : Nonempty (f '' s) :=
(Set.Nonempty.image f .of_subtype).to_subtype
/-- image and preimage are a Galois connection -/
@[simp]
theorem image_subset_iff {s : Set α} {t : Set β} {f : α → β} : f '' s ⊆ t ↔ s ⊆ f ⁻¹' t :=
forall_mem_image
theorem image_preimage_subset (f : α → β) (s : Set β) : f '' (f ⁻¹' s) ⊆ s :=
image_subset_iff.2 Subset.rfl
theorem subset_preimage_image (f : α → β) (s : Set α) : s ⊆ f ⁻¹' (f '' s) := fun _ =>
mem_image_of_mem f
theorem preimage_image_univ {f : α → β} : f ⁻¹' (f '' univ) = univ :=
Subset.antisymm (fun _ _ => trivial) (subset_preimage_image f univ)
@[simp]
theorem preimage_image_eq {f : α → β} (s : Set α) (h : Injective f) : f ⁻¹' (f '' s) = s :=
Subset.antisymm (fun _ ⟨_, hy, e⟩ => h e ▸ hy) (subset_preimage_image f s)
@[simp]
theorem image_preimage_eq {f : α → β} (s : Set β) (h : Surjective f) : f '' (f ⁻¹' s) = s :=
Subset.antisymm (image_preimage_subset f s) fun x hx =>
let ⟨y, e⟩ := h x
⟨y, (e.symm ▸ hx : f y ∈ s), e⟩
@[simp]
theorem Nonempty.subset_preimage_const {s : Set α} (hs : Set.Nonempty s) (t : Set β) (a : β) :
s ⊆ (fun _ => a) ⁻¹' t ↔ a ∈ t := by
rw [← image_subset_iff, hs.image_const, singleton_subset_iff]
-- Note defeq abuse identifying `preimage` with function composition in the following two proofs.
@[simp]
theorem preimage_injective : Injective (preimage f) ↔ Surjective f :=
injective_comp_right_iff_surjective
@[simp]
theorem preimage_surjective : Surjective (preimage f) ↔ Injective f :=
surjective_comp_right_iff_injective
@[simp]
theorem preimage_eq_preimage {f : β → α} (hf : Surjective f) : f ⁻¹' s = f ⁻¹' t ↔ s = t :=
(preimage_injective.mpr hf).eq_iff
theorem image_inter_preimage (f : α → β) (s : Set α) (t : Set β) :
f '' (s ∩ f ⁻¹' t) = f '' s ∩ t := by
apply Subset.antisymm
· calc
f '' (s ∩ f ⁻¹' t) ⊆ f '' s ∩ f '' (f ⁻¹' t) := image_inter_subset _ _ _
_ ⊆ f '' s ∩ t := inter_subset_inter_right _ (image_preimage_subset f t)
· rintro _ ⟨⟨x, h', rfl⟩, h⟩
exact ⟨x, ⟨h', h⟩, rfl⟩
theorem image_preimage_inter (f : α → β) (s : Set α) (t : Set β) :
f '' (f ⁻¹' t ∩ s) = t ∩ f '' s := by simp only [inter_comm, image_inter_preimage]
@[simp]
theorem image_inter_nonempty_iff {f : α → β} {s : Set α} {t : Set β} :
(f '' s ∩ t).Nonempty ↔ (s ∩ f ⁻¹' t).Nonempty := by
rw [← image_inter_preimage, image_nonempty]
theorem image_diff_preimage {f : α → β} {s : Set α} {t : Set β} :
f '' (s \ f ⁻¹' t) = f '' s \ t := by simp_rw [diff_eq, ← preimage_compl, image_inter_preimage]
theorem compl_image : image (compl : Set α → Set α) = preimage compl :=
image_eq_preimage_of_inverse compl_compl compl_compl
theorem compl_image_set_of {p : Set α → Prop} : compl '' { s | p s } = { s | p sᶜ } :=
congr_fun compl_image p
theorem inter_preimage_subset (s : Set α) (t : Set β) (f : α → β) :
s ∩ f ⁻¹' t ⊆ f ⁻¹' (f '' s ∩ t) := fun _ h => ⟨mem_image_of_mem _ h.left, h.right⟩
theorem union_preimage_subset (s : Set α) (t : Set β) (f : α → β) :
s ∪ f ⁻¹' t ⊆ f ⁻¹' (f '' s ∪ t) := fun _ h =>
Or.elim h (fun l => Or.inl <| mem_image_of_mem _ l) fun r => Or.inr r
theorem subset_image_union (f : α → β) (s : Set α) (t : Set β) : f '' (s ∪ f ⁻¹' t) ⊆ f '' s ∪ t :=
image_subset_iff.2 (union_preimage_subset _ _ _)
theorem preimage_subset_iff {A : Set α} {B : Set β} {f : α → β} :
f ⁻¹' B ⊆ A ↔ ∀ a : α, f a ∈ B → a ∈ A :=
Iff.rfl
theorem image_eq_image {f : α → β} (hf : Injective f) : f '' s = f '' t ↔ s = t :=
Iff.symm <|
(Iff.intro fun eq => eq ▸ rfl) fun eq => by
rw [← preimage_image_eq s hf, ← preimage_image_eq t hf, eq]
theorem subset_image_iff {t : Set β} :
t ⊆ f '' s ↔ ∃ u, u ⊆ s ∧ f '' u = t := by
refine ⟨fun h ↦ ⟨f ⁻¹' t ∩ s, inter_subset_right, ?_⟩,
fun ⟨u, hu, hu'⟩ ↦ hu'.symm ▸ image_mono hu⟩
rwa [image_preimage_inter, inter_eq_left]
@[simp]
lemma exists_subset_image_iff {p : Set β → Prop} : (∃ t ⊆ f '' s, p t) ↔ ∃ t ⊆ s, p (f '' t) := by
simp [subset_image_iff]
@[simp]
lemma forall_subset_image_iff {p : Set β → Prop} : (∀ t ⊆ f '' s, p t) ↔ ∀ t ⊆ s, p (f '' t) := by
simp [subset_image_iff]
theorem image_subset_image_iff {f : α → β} (hf : Injective f) : f '' s ⊆ f '' t ↔ s ⊆ t := by
refine Iff.symm <| (Iff.intro (image_subset f)) fun h => ?_
rw [← preimage_image_eq s hf, ← preimage_image_eq t hf]
exact preimage_mono h
theorem prod_quotient_preimage_eq_image [s : Setoid α] (g : Quotient s → β) {h : α → β}
(Hh : h = g ∘ Quotient.mk'') (r : Set (β × β)) :
{ x : Quotient s × Quotient s | (g x.1, g x.2) ∈ r } =
(fun a : α × α => (⟦a.1⟧, ⟦a.2⟧)) '' ((fun a : α × α => (h a.1, h a.2)) ⁻¹' r) :=
Hh.symm ▸
Set.ext fun ⟨a₁, a₂⟩ =>
⟨Quot.induction_on₂ a₁ a₂ fun a₁ a₂ h => ⟨(a₁, a₂), h, rfl⟩, fun ⟨⟨b₁, b₂⟩, h₁, h₂⟩ =>
show (g a₁, g a₂) ∈ r from
have h₃ : ⟦b₁⟧ = a₁ ∧ ⟦b₂⟧ = a₂ := Prod.ext_iff.1 h₂
h₃.1 ▸ h₃.2 ▸ h₁⟩
theorem exists_image_iff (f : α → β) (x : Set α) (P : β → Prop) :
(∃ a : f '' x, P a) ↔ ∃ a : x, P (f a) :=
⟨fun ⟨a, h⟩ => ⟨⟨_, a.prop.choose_spec.1⟩, a.prop.choose_spec.2.symm ▸ h⟩, fun ⟨a, h⟩ =>
⟨⟨_, _, a.prop, rfl⟩, h⟩⟩
theorem imageFactorization_eq {f : α → β} {s : Set α} :
Subtype.val ∘ imageFactorization f s = f ∘ Subtype.val :=
funext fun _ => rfl
theorem surjective_onto_image {f : α → β} {s : Set α} : Surjective (imageFactorization f s) :=
fun ⟨_, ⟨a, ha, rfl⟩⟩ => ⟨⟨a, ha⟩, rfl⟩
/-- If the only elements outside `s` are those left fixed by `σ`, then mapping by `σ` has no effect.
-/
theorem image_perm {s : Set α} {σ : Equiv.Perm α} (hs : { a : α | σ a ≠ a } ⊆ s) : σ '' s = s := by
ext i
obtain hi | hi := eq_or_ne (σ i) i
· refine ⟨?_, fun h => ⟨i, h, hi⟩⟩
rintro ⟨j, hj, h⟩
rwa [σ.injective (hi.trans h.symm)]
· refine iff_of_true ⟨σ.symm i, hs fun h => hi ?_, σ.apply_symm_apply _⟩ (hs hi)
convert congr_arg σ h <;> exact (σ.apply_symm_apply _).symm
end Image
/-! ### Lemmas about the powerset and image. -/
/-- The powerset of `{a} ∪ s` is `𝒫 s` together with `{a} ∪ t` for each `t ∈ 𝒫 s`. -/
theorem powerset_insert (s : Set α) (a : α) : 𝒫 insert a s = 𝒫 s ∪ insert a '' 𝒫 s := by
ext t
simp_rw [mem_union, mem_image, mem_powerset_iff]
constructor
· intro h
by_cases hs : a ∈ t
· right
refine ⟨t \ {a}, ?_, ?_⟩
· rw [diff_singleton_subset_iff]
assumption
· rw [insert_diff_singleton, insert_eq_of_mem hs]
· left
exact (subset_insert_iff_of_not_mem hs).mp h
· rintro (h | ⟨s', h₁, rfl⟩)
· exact subset_trans h (subset_insert a s)
· exact insert_subset_insert h₁
/-! ### Lemmas about range of a function. -/
section Range
variable {f : ι → α} {s t : Set α}
theorem forall_mem_range {p : α → Prop} : (∀ a ∈ range f, p a) ↔ ∀ i, p (f i) := by simp
theorem forall_subtype_range_iff {p : range f → Prop} :
(∀ a : range f, p a) ↔ ∀ i, p ⟨f i, mem_range_self _⟩ :=
⟨fun H _ => H _, fun H ⟨y, i, hi⟩ => by
subst hi
apply H⟩
theorem exists_range_iff {p : α → Prop} : (∃ a ∈ range f, p a) ↔ ∃ i, p (f i) := by simp
theorem exists_subtype_range_iff {p : range f → Prop} :
(∃ a : range f, p a) ↔ ∃ i, p ⟨f i, mem_range_self _⟩ :=
⟨fun ⟨⟨a, i, hi⟩, ha⟩ => by
subst a
exact ⟨i, ha⟩,
fun ⟨_, hi⟩ => ⟨_, hi⟩⟩
theorem range_eq_univ : range f = univ ↔ Surjective f :=
eq_univ_iff_forall
@[deprecated (since := "2024-11-11")] alias range_iff_surjective := range_eq_univ
alias ⟨_, _root_.Function.Surjective.range_eq⟩ := range_eq_univ
@[simp]
theorem subset_range_of_surjective {f : α → β} (h : Surjective f) (s : Set β) :
s ⊆ range f := Surjective.range_eq h ▸ subset_univ s
@[simp]
theorem image_univ {f : α → β} : f '' univ = range f := by
ext
simp [image, range]
lemma image_compl_eq_range_diff_image {f : α → β} (hf : Injective f) (s : Set α) :
f '' sᶜ = range f \ f '' s := by rw [← image_univ, ← image_diff hf, compl_eq_univ_diff]
/-- Alias of `Set.image_compl_eq_range_sdiff_image`. -/
lemma range_diff_image {f : α → β} (hf : Injective f) (s : Set α) : range f \ f '' s = f '' sᶜ := by
rw [image_compl_eq_range_diff_image hf]
@[simp]
theorem preimage_eq_univ_iff {f : α → β} {s} : f ⁻¹' s = univ ↔ range f ⊆ s := by
rw [← univ_subset_iff, ← image_subset_iff, image_univ]
theorem image_subset_range (f : α → β) (s) : f '' s ⊆ range f := by
rw [← image_univ]; exact image_subset _ (subset_univ _)
theorem mem_range_of_mem_image (f : α → β) (s) {x : β} (h : x ∈ f '' s) : x ∈ range f :=
image_subset_range f s h
theorem _root_.Nat.mem_range_succ (i : ℕ) : i ∈ range Nat.succ ↔ 0 < i :=
⟨by
rintro ⟨n, rfl⟩
exact Nat.succ_pos n, fun h => ⟨_, Nat.succ_pred_eq_of_pos h⟩⟩
theorem Nonempty.preimage' {s : Set β} (hs : s.Nonempty) {f : α → β} (hf : s ⊆ range f) :
(f ⁻¹' s).Nonempty :=
let ⟨_, hy⟩ := hs
let ⟨x, hx⟩ := hf hy
⟨x, Set.mem_preimage.2 <| hx.symm ▸ hy⟩
theorem range_comp (g : α → β) (f : ι → α) : range (g ∘ f) = g '' range f := by aesop
/--
Variant of `range_comp` using a lambda instead of function composition.
-/
theorem range_comp' (g : α → β) (f : ι → α) : range (fun x => g (f x)) = g '' range f :=
range_comp g f
theorem range_subset_iff : range f ⊆ s ↔ ∀ y, f y ∈ s :=
forall_mem_range
theorem range_subset_range_iff_exists_comp {f : α → γ} {g : β → γ} :
range f ⊆ range g ↔ ∃ h : α → β, f = g ∘ h := by
simp only [range_subset_iff, mem_range, Classical.skolem, funext_iff, (· ∘ ·), eq_comm]
theorem range_eq_iff (f : α → β) (s : Set β) :
range f = s ↔ (∀ a, f a ∈ s) ∧ ∀ b ∈ s, ∃ a, f a = b := by
rw [← range_subset_iff]
exact le_antisymm_iff
theorem range_comp_subset_range (f : α → β) (g : β → γ) : range (g ∘ f) ⊆ range g := by
rw [range_comp]; apply image_subset_range
theorem range_nonempty_iff_nonempty : (range f).Nonempty ↔ Nonempty ι :=
⟨fun ⟨_, x, _⟩ => ⟨x⟩, fun ⟨x⟩ => ⟨f x, mem_range_self x⟩⟩
theorem range_nonempty [h : Nonempty ι] (f : ι → α) : (range f).Nonempty :=
range_nonempty_iff_nonempty.2 h
@[simp]
theorem range_eq_empty_iff {f : ι → α} : range f = ∅ ↔ IsEmpty ι := by
rw [← not_nonempty_iff, ← range_nonempty_iff_nonempty, not_nonempty_iff_eq_empty]
theorem range_eq_empty [IsEmpty ι] (f : ι → α) : range f = ∅ :=
range_eq_empty_iff.2 ‹_›
instance instNonemptyRange [Nonempty ι] (f : ι → α) : Nonempty (range f) :=
(range_nonempty f).to_subtype
@[simp]
theorem image_union_image_compl_eq_range (f : α → β) : f '' s ∪ f '' sᶜ = range f := by
rw [← image_union, ← image_univ, ← union_compl_self]
theorem insert_image_compl_eq_range (f : α → β) (x : α) : insert (f x) (f '' {x}ᶜ) = range f := by
rw [← image_insert_eq, insert_eq, union_compl_self, image_univ]
theorem image_preimage_eq_range_inter {f : α → β} {t : Set β} : f '' (f ⁻¹' t) = range f ∩ t :=
ext fun x =>
⟨fun ⟨_, hx, HEq⟩ => HEq ▸ ⟨mem_range_self _, hx⟩, fun ⟨⟨y, h_eq⟩, hx⟩ =>
h_eq ▸ mem_image_of_mem f <| show y ∈ f ⁻¹' t by rw [preimage, mem_setOf, h_eq]; exact hx⟩
theorem image_preimage_eq_inter_range {f : α → β} {t : Set β} : f '' (f ⁻¹' t) = t ∩ range f := by
rw [image_preimage_eq_range_inter, inter_comm]
theorem image_preimage_eq_of_subset {f : α → β} {s : Set β} (hs : s ⊆ range f) :
f '' (f ⁻¹' s) = s := by rw [image_preimage_eq_range_inter, inter_eq_self_of_subset_right hs]
theorem image_preimage_eq_iff {f : α → β} {s : Set β} : f '' (f ⁻¹' s) = s ↔ s ⊆ range f :=
⟨by
intro h
rw [← h]
apply image_subset_range,
image_preimage_eq_of_subset⟩
theorem subset_range_iff_exists_image_eq {f : α → β} {s : Set β} : s ⊆ range f ↔ ∃ t, f '' t = s :=
⟨fun h => ⟨_, image_preimage_eq_iff.2 h⟩, fun ⟨_, ht⟩ => ht ▸ image_subset_range _ _⟩
theorem range_image (f : α → β) : range (image f) = 𝒫 range f :=
ext fun _ => subset_range_iff_exists_image_eq.symm
@[simp]
theorem exists_subset_range_and_iff {f : α → β} {p : Set β → Prop} :
(∃ s, s ⊆ range f ∧ p s) ↔ ∃ s, p (f '' s) := by
rw [← exists_range_iff, range_image]; rfl
@[simp]
theorem forall_subset_range_iff {f : α → β} {p : Set β → Prop} :
(∀ s, s ⊆ range f → p s) ↔ ∀ s, p (f '' s) := by
rw [← forall_mem_range, range_image]; simp only [mem_powerset_iff]
@[simp]
theorem preimage_subset_preimage_iff {s t : Set α} {f : β → α} (hs : s ⊆ range f) :
f ⁻¹' s ⊆ f ⁻¹' t ↔ s ⊆ t := by
constructor
· intro h x hx
rcases hs hx with ⟨y, rfl⟩
exact h hx
intro h x; apply h
theorem preimage_eq_preimage' {s t : Set α} {f : β → α} (hs : s ⊆ range f) (ht : t ⊆ range f) :
f ⁻¹' s = f ⁻¹' t ↔ s = t := by
constructor
· intro h
apply Subset.antisymm
· rw [← preimage_subset_preimage_iff hs, h]
· rw [← preimage_subset_preimage_iff ht, h]
rintro rfl; rfl
-- Not `@[simp]` since `simp` can prove this.
theorem preimage_inter_range {f : α → β} {s : Set β} : f ⁻¹' (s ∩ range f) = f ⁻¹' s :=
Set.ext fun x => and_iff_left ⟨x, rfl⟩
-- Not `@[simp]` since `simp` can prove this.
theorem preimage_range_inter {f : α → β} {s : Set β} : f ⁻¹' (range f ∩ s) = f ⁻¹' s := by
rw [inter_comm, preimage_inter_range]
theorem preimage_image_preimage {f : α → β} {s : Set β} : f ⁻¹' (f '' (f ⁻¹' s)) = f ⁻¹' s := by
rw [image_preimage_eq_range_inter, preimage_range_inter]
@[simp, mfld_simps]
theorem range_id : range (@id α) = univ :=
range_eq_univ.2 surjective_id
@[simp, mfld_simps]
theorem range_id' : (range fun x : α => x) = univ :=
range_id
@[simp]
theorem _root_.Prod.range_fst [Nonempty β] : range (Prod.fst : α × β → α) = univ :=
Prod.fst_surjective.range_eq
@[simp]
theorem _root_.Prod.range_snd [Nonempty α] : range (Prod.snd : α × β → β) = univ :=
Prod.snd_surjective.range_eq
@[simp]
theorem range_eval {α : ι → Sort _} [∀ i, Nonempty (α i)] (i : ι) :
range (eval i : (∀ i, α i) → α i) = univ :=
(surjective_eval i).range_eq
theorem range_inl : range (@Sum.inl α β) = {x | Sum.isLeft x} := by ext (_|_) <;> simp
theorem range_inr : range (@Sum.inr α β) = {x | Sum.isRight x} := by ext (_|_) <;> simp
theorem isCompl_range_inl_range_inr : IsCompl (range <| @Sum.inl α β) (range Sum.inr) :=
IsCompl.of_le
(by
rintro y ⟨⟨x₁, rfl⟩, ⟨x₂, h⟩⟩
exact Sum.noConfusion h)
(by rintro (x | y) - <;> [left; right] <;> exact mem_range_self _)
@[simp]
theorem range_inl_union_range_inr : range (Sum.inl : α → α ⊕ β) ∪ range Sum.inr = univ :=
isCompl_range_inl_range_inr.sup_eq_top
@[simp]
theorem range_inl_inter_range_inr : range (Sum.inl : α → α ⊕ β) ∩ range Sum.inr = ∅ :=
isCompl_range_inl_range_inr.inf_eq_bot
@[simp]
theorem range_inr_union_range_inl : range (Sum.inr : β → α ⊕ β) ∪ range Sum.inl = univ :=
isCompl_range_inl_range_inr.symm.sup_eq_top
@[simp]
theorem range_inr_inter_range_inl : range (Sum.inr : β → α ⊕ β) ∩ range Sum.inl = ∅ :=
isCompl_range_inl_range_inr.symm.inf_eq_bot
@[simp]
theorem preimage_inl_image_inr (s : Set β) : Sum.inl ⁻¹' (@Sum.inr α β '' s) = ∅ := by
ext
simp
@[simp]
theorem preimage_inr_image_inl (s : Set α) : Sum.inr ⁻¹' (@Sum.inl α β '' s) = ∅ := by
ext
simp
@[simp]
theorem preimage_inl_range_inr : Sum.inl ⁻¹' range (Sum.inr : β → α ⊕ β) = ∅ := by
rw [← image_univ, preimage_inl_image_inr]
@[simp]
theorem preimage_inr_range_inl : Sum.inr ⁻¹' range (Sum.inl : α → α ⊕ β) = ∅ := by
rw [← image_univ, preimage_inr_image_inl]
@[simp]
theorem compl_range_inl : (range (Sum.inl : α → α ⊕ β))ᶜ = range (Sum.inr : β → α ⊕ β) :=
IsCompl.compl_eq isCompl_range_inl_range_inr
@[simp]
theorem compl_range_inr : (range (Sum.inr : β → α ⊕ β))ᶜ = range (Sum.inl : α → α ⊕ β) :=
IsCompl.compl_eq isCompl_range_inl_range_inr.symm
theorem image_preimage_inl_union_image_preimage_inr (s : Set (α ⊕ β)) :
Sum.inl '' (Sum.inl ⁻¹' s) ∪ Sum.inr '' (Sum.inr ⁻¹' s) = s := by
rw [image_preimage_eq_inter_range, image_preimage_eq_inter_range, ← inter_union_distrib_left,
range_inl_union_range_inr, inter_univ]
@[simp]
theorem range_quot_mk (r : α → α → Prop) : range (Quot.mk r) = univ :=
Quot.mk_surjective.range_eq
@[simp]
theorem range_quot_lift {r : ι → ι → Prop} (hf : ∀ x y, r x y → f x = f y) :
range (Quot.lift f hf) = range f :=
ext fun _ => Quot.mk_surjective.exists
@[simp]
theorem range_quotient_mk {s : Setoid α} : range (Quotient.mk s) = univ :=
range_quot_mk _
@[simp]
theorem range_quotient_lift [s : Setoid ι] (hf) :
range (Quotient.lift f hf : Quotient s → α) = range f :=
range_quot_lift _
@[simp]
theorem range_quotient_mk' {s : Setoid α} : range (Quotient.mk' : α → Quotient s) = univ :=
range_quot_mk _
lemma Quotient.range_mk'' {sa : Setoid α} : range (Quotient.mk'' (s₁ := sa)) = univ :=
range_quotient_mk
@[simp]
theorem range_quotient_lift_on' {s : Setoid ι} (hf) :
(range fun x : Quotient s => Quotient.liftOn' x f hf) = range f :=
range_quot_lift _
instance canLift (c) (p) [CanLift α β c p] :
CanLift (Set α) (Set β) (c '' ·) fun s => ∀ x ∈ s, p x where
prf _ hs := subset_range_iff_exists_image_eq.mp fun x hx => CanLift.prf _ (hs x hx)
theorem range_const_subset {c : α} : (range fun _ : ι => c) ⊆ {c} :=
range_subset_iff.2 fun _ => rfl
@[simp]
theorem range_const : ∀ [Nonempty ι] {c : α}, (range fun _ : ι => c) = {c}
| ⟨x⟩, _ =>
(Subset.antisymm range_const_subset) fun _ hy =>
(mem_singleton_iff.1 hy).symm ▸ mem_range_self x
theorem range_subtype_map {p : α → Prop} {q : β → Prop} (f : α → β) (h : ∀ x, p x → q (f x)) :
range (Subtype.map f h) = (↑) ⁻¹' (f '' { x | p x }) := by
ext ⟨x, hx⟩
simp_rw [mem_preimage, mem_range, mem_image, Subtype.exists, Subtype.map]
simp only [Subtype.mk.injEq, exists_prop, mem_setOf_eq]
theorem image_swap_eq_preimage_swap : image (@Prod.swap α β) = preimage Prod.swap :=
image_eq_preimage_of_inverse Prod.swap_leftInverse Prod.swap_rightInverse
theorem preimage_singleton_nonempty {f : α → β} {y : β} : (f ⁻¹' {y}).Nonempty ↔ y ∈ range f :=
Iff.rfl
theorem preimage_singleton_eq_empty {f : α → β} {y : β} : f ⁻¹' {y} = ∅ ↔ y ∉ range f :=
not_nonempty_iff_eq_empty.symm.trans preimage_singleton_nonempty.not
theorem range_subset_singleton {f : ι → α} {x : α} : range f ⊆ {x} ↔ f = const ι x := by
simp [range_subset_iff, funext_iff, mem_singleton]
theorem image_compl_preimage {f : α → β} {s : Set β} : f '' (f ⁻¹' s)ᶜ = range f \ s := by
rw [compl_eq_univ_diff, image_diff_preimage, image_univ]
theorem rangeFactorization_eq {f : ι → β} : Subtype.val ∘ rangeFactorization f = f :=
funext fun _ => rfl
@[simp]
theorem rangeFactorization_coe (f : ι → β) (a : ι) : (rangeFactorization f a : β) = f a :=
rfl
@[simp]
theorem coe_comp_rangeFactorization (f : ι → β) : (↑) ∘ rangeFactorization f = f := rfl
theorem surjective_onto_range : Surjective (rangeFactorization f) := fun ⟨_, ⟨i, rfl⟩⟩ => ⟨i, rfl⟩
theorem image_eq_range (f : α → β) (s : Set α) : f '' s = range fun x : s => f x := by
ext
constructor
· rintro ⟨x, h1, h2⟩
exact ⟨⟨x, h1⟩, h2⟩
· rintro ⟨⟨x, h1⟩, h2⟩
exact ⟨x, h1, h2⟩
theorem _root_.Sum.range_eq (f : α ⊕ β → γ) :
range f = range (f ∘ Sum.inl) ∪ range (f ∘ Sum.inr) :=
ext fun _ => Sum.exists
@[simp]
theorem Sum.elim_range (f : α → γ) (g : β → γ) : range (Sum.elim f g) = range f ∪ range g :=
Sum.range_eq _
theorem range_ite_subset' {p : Prop} [Decidable p] {f g : α → β} :
range (if p then f else g) ⊆ range f ∪ range g := by
by_cases h : p
· rw [if_pos h]
exact subset_union_left
· rw [if_neg h]
exact subset_union_right
theorem range_ite_subset {p : α → Prop} [DecidablePred p] {f g : α → β} :
(range fun x => if p x then f x else g x) ⊆ range f ∪ range g := by
rw [range_subset_iff]; intro x; by_cases h : p x
· simp only [if_pos h, mem_union, mem_range, exists_apply_eq_apply, true_or]
· simp [if_neg h, mem_union, mem_range_self]
@[simp]
theorem preimage_range (f : α → β) : f ⁻¹' range f = univ :=
eq_univ_of_forall mem_range_self
/-- The range of a function from a `Unique` type contains just the
function applied to its single value. -/
theorem range_unique [h : Unique ι] : range f = {f default} := by
ext x
rw [mem_range]
constructor
· rintro ⟨i, hi⟩
rw [h.uniq i] at hi
exact hi ▸ mem_singleton _
· exact fun h => ⟨default, h.symm⟩
theorem range_diff_image_subset (f : α → β) (s : Set α) : range f \ f '' s ⊆ f '' sᶜ :=
fun _ ⟨⟨x, h₁⟩, h₂⟩ => ⟨x, fun h => h₂ ⟨x, h, h₁⟩, h₁⟩
@[simp]
theorem range_inclusion (h : s ⊆ t) : range (inclusion h) = { x : t | (x : α) ∈ s } := by
ext ⟨x, hx⟩
simp
-- When `f` is injective, see also `Equiv.ofInjective`.
theorem leftInverse_rangeSplitting (f : α → β) :
LeftInverse (rangeFactorization f) (rangeSplitting f) := fun x => by
ext
simp only [rangeFactorization_coe]
apply apply_rangeSplitting
theorem rangeSplitting_injective (f : α → β) : Injective (rangeSplitting f) :=
(leftInverse_rangeSplitting f).injective
theorem rightInverse_rangeSplitting {f : α → β} (h : Injective f) :
RightInverse (rangeFactorization f) (rangeSplitting f) :=
(leftInverse_rangeSplitting f).rightInverse_of_injective fun _ _ hxy =>
h <| Subtype.ext_iff.1 hxy
theorem preimage_rangeSplitting {f : α → β} (hf : Injective f) :
preimage (rangeSplitting f) = image (rangeFactorization f) :=
(image_eq_preimage_of_inverse (rightInverse_rangeSplitting hf)
(leftInverse_rangeSplitting f)).symm
theorem isCompl_range_some_none (α : Type*) : IsCompl (range (some : α → Option α)) {none} :=
IsCompl.of_le (fun _ ⟨⟨_, ha⟩, (hn : _ = none)⟩ => Option.some_ne_none _ (ha.trans hn))
fun x _ => Option.casesOn x (Or.inr rfl) fun _ => Or.inl <| mem_range_self _
@[simp]
theorem compl_range_some (α : Type*) : (range (some : α → Option α))ᶜ = {none} :=
(isCompl_range_some_none α).compl_eq
@[simp]
theorem range_some_inter_none (α : Type*) : range (some : α → Option α) ∩ {none} = ∅ :=
(isCompl_range_some_none α).inf_eq_bot
-- Not `@[simp]` since `simp` can prove this.
theorem range_some_union_none (α : Type*) : range (some : α → Option α) ∪ {none} = univ :=
(isCompl_range_some_none α).sup_eq_top
@[simp]
theorem insert_none_range_some (α : Type*) : insert none (range (some : α → Option α)) = univ :=
(isCompl_range_some_none α).symm.sup_eq_top
lemma image_of_range_union_range_eq_univ {α β γ γ' δ δ' : Type*}
{h : β → α} {f : γ → β} {f₁ : γ' → α} {f₂ : γ → γ'} {g : δ → β} {g₁ : δ' → α} {g₂ : δ → δ'}
(hf : h ∘ f = f₁ ∘ f₂) (hg : h ∘ g = g₁ ∘ g₂) (hfg : range f ∪ range g = univ) (s : Set β) :
h '' s = f₁ '' (f₂ '' (f ⁻¹' s)) ∪ g₁ '' (g₂ '' (g ⁻¹' s)) := by
rw [← image_comp, ← image_comp, ← hf, ← hg, image_comp, image_comp, image_preimage_eq_inter_range,
image_preimage_eq_inter_range, ← image_union, ← inter_union_distrib_left, hfg, inter_univ]
end Range
section Subsingleton
variable {s : Set α} {f : α → β}
/-- The image of a subsingleton is a subsingleton. -/
theorem Subsingleton.image (hs : s.Subsingleton) (f : α → β) : (f '' s).Subsingleton :=
fun _ ⟨_, hx, Hx⟩ _ ⟨_, hy, Hy⟩ => Hx ▸ Hy ▸ congr_arg f (hs hx hy)
/-- The preimage of a subsingleton under an injective map is a subsingleton. -/
theorem Subsingleton.preimage {s : Set β} (hs : s.Subsingleton)
(hf : Function.Injective f) : (f ⁻¹' s).Subsingleton := fun _ ha _ hb => hf <| hs ha hb
/-- If the image of a set under an injective map is a subsingleton, the set is a subsingleton. -/
theorem subsingleton_of_image (hf : Function.Injective f) (s : Set α)
(hs : (f '' s).Subsingleton) : s.Subsingleton :=
(hs.preimage hf).anti <| subset_preimage_image _ _
/-- If the preimage of a set under a surjective map is a subsingleton,
the set is a subsingleton. -/
theorem subsingleton_of_preimage (hf : Function.Surjective f) (s : Set β)
(hs : (f ⁻¹' s).Subsingleton) : s.Subsingleton := fun fx hx fy hy => by
rcases hf fx, hf fy with ⟨⟨x, rfl⟩, ⟨y, rfl⟩⟩
exact congr_arg f (hs hx hy)
theorem subsingleton_range {α : Sort*} [Subsingleton α] (f : α → β) : (range f).Subsingleton :=
forall_mem_range.2 fun x => forall_mem_range.2 fun y => congr_arg f (Subsingleton.elim x y)
/-- The preimage of a nontrivial set under a surjective map is nontrivial. -/
theorem Nontrivial.preimage {s : Set β} (hs : s.Nontrivial)
(hf : Function.Surjective f) : (f ⁻¹' s).Nontrivial := by
rcases hs with ⟨fx, hx, fy, hy, hxy⟩
rcases hf fx, hf fy with ⟨⟨x, rfl⟩, ⟨y, rfl⟩⟩
exact ⟨x, hx, y, hy, mt (congr_arg f) hxy⟩
/-- The image of a nontrivial set under an injective map is nontrivial. -/
theorem Nontrivial.image (hs : s.Nontrivial) (hf : Function.Injective f) :
(f '' s).Nontrivial :=
let ⟨x, hx, y, hy, hxy⟩ := hs
⟨f x, mem_image_of_mem f hx, f y, mem_image_of_mem f hy, hf.ne hxy⟩
theorem Nontrivial.image_of_injOn (hs : s.Nontrivial) (hf : s.InjOn f) :
(f '' s).Nontrivial := by
obtain ⟨x, hx, y, hy, hxy⟩ := hs
exact ⟨f x, mem_image_of_mem _ hx, f y, mem_image_of_mem _ hy, (hxy <| hf hx hy ·)⟩
/-- If the image of a set is nontrivial, the set is nontrivial. -/
theorem nontrivial_of_image (f : α → β) (s : Set α) (hs : (f '' s).Nontrivial) : s.Nontrivial :=
let ⟨_, ⟨x, hx, rfl⟩, _, ⟨y, hy, rfl⟩, hxy⟩ := hs
⟨x, hx, y, hy, mt (congr_arg f) hxy⟩
@[simp]
theorem image_nontrivial (hf : f.Injective) : (f '' s).Nontrivial ↔ s.Nontrivial :=
⟨nontrivial_of_image f s, fun h ↦ h.image hf⟩
@[simp]
theorem InjOn.image_nontrivial_iff (hf : s.InjOn f) :
(f '' s).Nontrivial ↔ s.Nontrivial :=
⟨nontrivial_of_image f s, fun h ↦ h.image_of_injOn hf⟩
/-- If the preimage of a set under an injective map is nontrivial, the set is nontrivial. -/
theorem nontrivial_of_preimage (hf : Function.Injective f) (s : Set β)
(hs : (f ⁻¹' s).Nontrivial) : s.Nontrivial :=
(hs.image hf).mono <| image_preimage_subset _ _
end Subsingleton
end Set
namespace Function
variable {α β : Type*} {ι : Sort*} {f : α → β}
open Set
theorem Surjective.preimage_injective (hf : Surjective f) : Injective (preimage f) := fun _ _ =>
(preimage_eq_preimage hf).1
theorem Injective.preimage_image (hf : Injective f) (s : Set α) : f ⁻¹' (f '' s) = s :=
preimage_image_eq s hf
theorem Injective.preimage_surjective (hf : Injective f) : Surjective (preimage f) :=
Set.preimage_surjective.mpr hf
theorem Injective.subsingleton_image_iff (hf : Injective f) {s : Set α} :
(f '' s).Subsingleton ↔ s.Subsingleton :=
⟨subsingleton_of_image hf s, fun h => h.image f⟩
theorem Surjective.image_preimage (hf : Surjective f) (s : Set β) : f '' (f ⁻¹' s) = s :=
image_preimage_eq s hf
theorem Surjective.image_surjective (hf : Surjective f) : Surjective (image f) := by
intro s
use f ⁻¹' s
rw [hf.image_preimage]
@[simp]
theorem Surjective.nonempty_preimage (hf : Surjective f) {s : Set β} :
(f ⁻¹' s).Nonempty ↔ s.Nonempty := by rw [← image_nonempty, hf.image_preimage]
theorem Injective.image_injective (hf : Injective f) : Injective (image f) := by
intro s t h
rw [← preimage_image_eq s hf, ← preimage_image_eq t hf, h]
lemma Injective.image_strictMono (inj : Function.Injective f) : StrictMono (image f) :=
monotone_image.strictMono_of_injective inj.image_injective
theorem Surjective.preimage_subset_preimage_iff {s t : Set β} (hf : Surjective f) :
f ⁻¹' s ⊆ f ⁻¹' t ↔ s ⊆ t := by
apply Set.preimage_subset_preimage_iff
rw [hf.range_eq]
apply subset_univ
theorem Surjective.range_comp {ι' : Sort*} {f : ι → ι'} (hf : Surjective f) (g : ι' → α) :
range (g ∘ f) = range g :=
ext fun y => (@Surjective.exists _ _ _ hf fun x => g x = y).symm
theorem Injective.mem_range_iff_existsUnique (hf : Injective f) {b : β} :
b ∈ range f ↔ ∃! a, f a = b :=
⟨fun ⟨a, h⟩ => ⟨a, h, fun _ ha => hf (ha.trans h.symm)⟩, ExistsUnique.exists⟩
alias ⟨Injective.existsUnique_of_mem_range, _⟩ := Injective.mem_range_iff_existsUnique
theorem Injective.compl_image_eq (hf : Injective f) (s : Set α) :
(f '' s)ᶜ = f '' sᶜ ∪ (range f)ᶜ := by
ext y
rcases em (y ∈ range f) with (⟨x, rfl⟩ | hx)
· simp [hf.eq_iff]
· rw [mem_range, not_exists] at hx
simp [hx]
theorem LeftInverse.image_image {g : β → α} (h : LeftInverse g f) (s : Set α) :
g '' (f '' s) = s := by rw [← image_comp, h.comp_eq_id, image_id]
theorem LeftInverse.preimage_preimage {g : β → α} (h : LeftInverse g f) (s : Set α) :
f ⁻¹' (g ⁻¹' s) = s := by rw [← preimage_comp, h.comp_eq_id, preimage_id]
protected theorem Involutive.preimage {f : α → α} (hf : Involutive f) : Involutive (preimage f) :=
hf.rightInverse.preimage_preimage
end Function
namespace EquivLike
variable {ι ι' : Sort*} {E : Type*} [EquivLike E ι ι']
@[simp] lemma range_comp {α : Type*} (f : ι' → α) (e : E) : range (f ∘ e) = range f :=
(EquivLike.surjective _).range_comp _
end EquivLike
/-! ### Image and preimage on subtypes -/
namespace Subtype
variable {α : Type*}
theorem coe_image {p : α → Prop} {s : Set (Subtype p)} :
(↑) '' s = { x | ∃ h : p x, (⟨x, h⟩ : Subtype p) ∈ s } :=
Set.ext fun a =>
⟨fun ⟨⟨_, ha'⟩, in_s, h_eq⟩ => h_eq ▸ ⟨ha', in_s⟩, fun ⟨ha, in_s⟩ => ⟨⟨a, ha⟩, in_s, rfl⟩⟩
@[simp]
theorem coe_image_of_subset {s t : Set α} (h : t ⊆ s) : (↑) '' { x : ↥s | ↑x ∈ t } = t := by
ext x
rw [mem_image]
exact ⟨fun ⟨_, hx', hx⟩ => hx ▸ hx', fun hx => ⟨⟨x, h hx⟩, hx, rfl⟩⟩
theorem range_coe {s : Set α} : range ((↑) : s → α) = s := by
rw [← image_univ]
simp [-image_univ, coe_image]
/-- A variant of `range_coe`. Try to use `range_coe` if possible.
This version is useful when defining a new type that is defined as the subtype of something.
In that case, the coercion doesn't fire anymore. -/
theorem range_val {s : Set α} : range (Subtype.val : s → α) = s :=
range_coe
/-- We make this the simp lemma instead of `range_coe`. The reason is that if we write
for `s : Set α` the function `(↑) : s → α`, then the inferred implicit arguments of `(↑)` are
`↑α (fun x ↦ x ∈ s)`. -/
@[simp]
theorem range_coe_subtype {p : α → Prop} : range ((↑) : Subtype p → α) = { x | p x } :=
range_coe
@[simp]
theorem coe_preimage_self (s : Set α) : ((↑) : s → α) ⁻¹' s = univ := by
rw [← preimage_range, range_coe]
theorem range_val_subtype {p : α → Prop} : range (Subtype.val : Subtype p → α) = { x | p x } :=
range_coe
theorem coe_image_subset (s : Set α) (t : Set s) : ((↑) : s → α) '' t ⊆ s :=
fun x ⟨y, _, yvaleq⟩ => by
rw [← yvaleq]; exact y.property
theorem coe_image_univ (s : Set α) : ((↑) : s → α) '' Set.univ = s :=
image_univ.trans range_coe
@[simp]
theorem image_preimage_coe (s t : Set α) : ((↑) : s → α) '' (((↑) : s → α) ⁻¹' t) = s ∩ t :=
image_preimage_eq_range_inter.trans <| congr_arg (· ∩ t) range_coe
theorem image_preimage_val (s t : Set α) : (Subtype.val : s → α) '' (Subtype.val ⁻¹' t) = s ∩ t :=
image_preimage_coe s t
theorem preimage_coe_eq_preimage_coe_iff {s t u : Set α} :
((↑) : s → α) ⁻¹' t = ((↑) : s → α) ⁻¹' u ↔ s ∩ t = s ∩ u := by
rw [← image_preimage_coe, ← image_preimage_coe, coe_injective.image_injective.eq_iff]
theorem preimage_coe_self_inter (s t : Set α) :
((↑) : s → α) ⁻¹' (s ∩ t) = ((↑) : s → α) ⁻¹' t := by
rw [preimage_coe_eq_preimage_coe_iff, ← inter_assoc, inter_self]
-- Not `@[simp]` since `simp` can prove this.
theorem preimage_coe_inter_self (s t : Set α) :
((↑) : s → α) ⁻¹' (t ∩ s) = ((↑) : s → α) ⁻¹' t := by
rw [inter_comm, preimage_coe_self_inter]
theorem preimage_val_eq_preimage_val_iff (s t u : Set α) :
(Subtype.val : s → α) ⁻¹' t = Subtype.val ⁻¹' u ↔ s ∩ t = s ∩ u :=
preimage_coe_eq_preimage_coe_iff
lemma preimage_val_subset_preimage_val_iff (s t u : Set α) :
(Subtype.val ⁻¹' t : Set s) ⊆ Subtype.val ⁻¹' u ↔ s ∩ t ⊆ s ∩ u := by
constructor
· rw [← image_preimage_coe, ← image_preimage_coe]
exact image_subset _
· intro h x a
exact (h ⟨x.2, a⟩).2
theorem exists_set_subtype {t : Set α} (p : Set α → Prop) :
(∃ s : Set t, p (((↑) : t → α) '' s)) ↔ ∃ s : Set α, s ⊆ t ∧ p s := by
rw [← exists_subset_range_and_iff, range_coe]
theorem forall_set_subtype {t : Set α} (p : Set α → Prop) :
(∀ s : Set t, p (((↑) : t → α) '' s)) ↔ ∀ s : Set α, s ⊆ t → p s := by
rw [← forall_subset_range_iff, range_coe]
theorem preimage_coe_nonempty {s t : Set α} :
(((↑) : s → α) ⁻¹' t).Nonempty ↔ (s ∩ t).Nonempty := by
rw [← image_preimage_coe, image_nonempty]
theorem preimage_coe_eq_empty {s t : Set α} : ((↑) : s → α) ⁻¹' t = ∅ ↔ s ∩ t = ∅ := by
simp [← not_nonempty_iff_eq_empty, preimage_coe_nonempty]
-- Not `@[simp]` since `simp` can prove this.
theorem preimage_coe_compl (s : Set α) : ((↑) : s → α) ⁻¹' sᶜ = ∅ :=
preimage_coe_eq_empty.2 (inter_compl_self s)
@[simp]
theorem preimage_coe_compl' (s : Set α) :
(fun x : (sᶜ : Set α) => (x : α)) ⁻¹' s = ∅ :=
preimage_coe_eq_empty.2 (compl_inter_self s)
end Subtype
/-! ### Images and preimages on `Option` -/
open Set
namespace Option
theorem injective_iff {α β} {f : Option α → β} :
Injective f ↔ Injective (f ∘ some) ∧ f none ∉ range (f ∘ some) := by
simp only [mem_range, not_exists, (· ∘ ·)]
refine
⟨fun hf => ⟨hf.comp (Option.some_injective _), fun x => hf.ne <| Option.some_ne_none _⟩, ?_⟩
rintro ⟨h_some, h_none⟩ (_ | a) (_ | b) hab
exacts [rfl, (h_none _ hab.symm).elim, (h_none _ hab).elim, congr_arg some (h_some hab)]
theorem range_eq {α β} (f : Option α → β) : range f = insert (f none) (range (f ∘ some)) :=
Set.ext fun _ => Option.exists.trans <| eq_comm.or Iff.rfl
end Option
namespace Set
open Function
/-! ### Injectivity and surjectivity lemmas for image and preimage -/
section ImagePreimage
variable {α : Type u} {β : Type v} {f : α → β}
@[simp]
theorem image_surjective : Surjective (image f) ↔ Surjective f := by
refine ⟨fun h y => ?_, Surjective.image_surjective⟩
rcases h {y} with ⟨s, hs⟩
have := mem_singleton y; rw [← hs] at this; rcases this with ⟨x, _, hx⟩
exact ⟨x, hx⟩
@[simp]
theorem image_injective : Injective (image f) ↔ Injective f := by
refine ⟨fun h x x' hx => ?_, Injective.image_injective⟩
rw [← singleton_eq_singleton_iff]; apply h
rw [image_singleton, image_singleton, hx]
theorem preimage_eq_iff_eq_image {f : α → β} (hf : Bijective f) {s t} :
f ⁻¹' s = t ↔ s = f '' t := by rw [← image_eq_image hf.1, hf.2.image_preimage]
theorem eq_preimage_iff_image_eq {f : α → β} (hf : Bijective f) {s t} :
s = f ⁻¹' t ↔ f '' s = t := by rw [← image_eq_image hf.1, hf.2.image_preimage]
end ImagePreimage
end Set
/-! ### Disjoint lemmas for image and preimage -/
section Disjoint
variable {α β γ : Type*} {f : α → β} {s t : Set α}
theorem Disjoint.preimage (f : α → β) {s t : Set β} (h : Disjoint s t) :
Disjoint (f ⁻¹' s) (f ⁻¹' t) :=
disjoint_iff_inf_le.mpr fun _ hx => h.le_bot hx
lemma Codisjoint.preimage (f : α → β) {s t : Set β} (h : Codisjoint s t) :
Codisjoint (f ⁻¹' s) (f ⁻¹' t) := by
simp only [codisjoint_iff_le_sup, Set.sup_eq_union, top_le_iff, ← Set.preimage_union] at h ⊢
rw [h]; rfl
lemma IsCompl.preimage (f : α → β) {s t : Set β} (h : IsCompl s t) :
IsCompl (f ⁻¹' s) (f ⁻¹' t) :=
⟨h.1.preimage f, h.2.preimage f⟩
namespace Set
theorem disjoint_image_image {f : β → α} {g : γ → α} {s : Set β} {t : Set γ}
(h : ∀ b ∈ s, ∀ c ∈ t, f b ≠ g c) : Disjoint (f '' s) (g '' t) :=
disjoint_iff_inf_le.mpr <| by rintro a ⟨⟨b, hb, eq⟩, c, hc, rfl⟩; exact h b hb c hc eq
theorem disjoint_image_of_injective (hf : Injective f) {s t : Set α} (hd : Disjoint s t) :
Disjoint (f '' s) (f '' t) :=
disjoint_image_image fun _ hx _ hy => hf.ne fun H => Set.disjoint_iff.1 hd ⟨hx, H.symm ▸ hy⟩
theorem _root_.Disjoint.of_image (h : Disjoint (f '' s) (f '' t)) : Disjoint s t :=
disjoint_iff_inf_le.mpr fun _ hx =>
disjoint_left.1 h (mem_image_of_mem _ hx.1) (mem_image_of_mem _ hx.2)
@[simp]
theorem disjoint_image_iff (hf : Injective f) : Disjoint (f '' s) (f '' t) ↔ Disjoint s t :=
⟨Disjoint.of_image, disjoint_image_of_injective hf⟩
theorem _root_.Disjoint.of_preimage (hf : Surjective f) {s t : Set β}
(h : Disjoint (f ⁻¹' s) (f ⁻¹' t)) : Disjoint s t := by
rw [disjoint_iff_inter_eq_empty, ← image_preimage_eq (_ ∩ _) hf, preimage_inter, h.inter_eq,
image_empty]
@[simp]
theorem disjoint_preimage_iff (hf : Surjective f) {s t : Set β} :
Disjoint (f ⁻¹' s) (f ⁻¹' t) ↔ Disjoint s t :=
⟨Disjoint.of_preimage hf, Disjoint.preimage _⟩
theorem preimage_eq_empty {s : Set β} (h : Disjoint s (range f)) :
f ⁻¹' s = ∅ := by
simpa using h.preimage f
theorem preimage_eq_empty_iff {s : Set β} : f ⁻¹' s = ∅ ↔ Disjoint s (range f) :=
⟨fun h => by
simp only [eq_empty_iff_forall_not_mem, disjoint_iff_inter_eq_empty, not_exists, mem_inter_iff,
not_and, mem_range, mem_preimage] at h ⊢
intro y hy x hx
rw [← hx] at hy
exact h x hy,
preimage_eq_empty⟩
end Set
end Disjoint
section Sigma
variable {α : Type*} {β : α → Type*} {i j : α} {s : Set (β i)}
lemma sigma_mk_preimage_image' (h : i ≠ j) : Sigma.mk j ⁻¹' (Sigma.mk i '' s) = ∅ := by
simp [image, h]
lemma sigma_mk_preimage_image_eq_self : Sigma.mk i ⁻¹' (Sigma.mk i '' s) = s := by
simp [image]
end Sigma
| Mathlib/Data/Set/Image.lean | 1,402 | 1,404 | |
/-
Copyright (c) 2021 Sébastien Gouëzel. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Sébastien Gouëzel
-/
import Mathlib.MeasureTheory.Measure.AbsolutelyContinuous
/-!
# Vitali families
On a metric space `X` with a measure `μ`, consider for each `x : X` a family of measurable sets with
nonempty interiors, called `setsAt x`. This family is a Vitali family if it satisfies the following
property: consider a (possibly non-measurable) set `s`, and for any `x` in `s` a
subfamily `f x` of `setsAt x` containing sets of arbitrarily small diameter. Then one can extract
a disjoint subfamily covering almost all `s`.
Vitali families are provided by covering theorems such as the Besicovitch covering theorem or the
Vitali covering theorem. They make it possible to formulate general versions of theorems on
differentiations of measure that apply in both contexts.
This file gives the basic definition of Vitali families. More interesting developments of this
notion are deferred to other files:
* constructions of specific Vitali families are provided by the Besicovitch covering theorem, in
`Besicovitch.vitaliFamily`, and by the Vitali covering theorem, in `Vitali.vitaliFamily`.
* The main theorem on differentiation of measures along a Vitali family is proved in
`VitaliFamily.ae_tendsto_rnDeriv`.
## Main definitions
* `VitaliFamily μ` is a structure made, for each `x : X`, of a family of sets around `x`, such that
one can extract an almost everywhere disjoint covering from any subfamily containing sets of
arbitrarily small diameters.
Let `v` be such a Vitali family.
* `v.FineSubfamilyOn` describes the subfamilies of `v` from which one can extract almost
everywhere disjoint coverings. This property, called
`v.FineSubfamilyOn.exists_disjoint_covering_ae`, is essentially a restatement of the definition
of a Vitali family. We also provide an API to use efficiently such a disjoint covering.
* `v.filterAt x` is a filter on sets of `X`, such that convergence with respect to this filter
means convergence when sets in the Vitali family shrink towards `x`.
## References
* [Herbert Federer, Geometric Measure Theory, Chapter 2.8][Federer1996] (Vitali families are called
Vitali relations there)
-/
open MeasureTheory Metric Set Filter TopologicalSpace MeasureTheory.Measure
open scoped Topology
variable {X : Type*} [PseudoMetricSpace X]
/-- On a metric space `X` with a measure `μ`, consider for each `x : X` a family of measurable sets
with nonempty interiors, called `setsAt x`. This family is a Vitali family if it satisfies the
following property: consider a (possibly non-measurable) set `s`, and for any `x` in `s` a
subfamily `f x` of `setsAt x` containing sets of arbitrarily small diameter. Then one can extract
a disjoint subfamily covering almost all `s`.
Vitali families are provided by covering theorems such as the Besicovitch covering theorem or the
Vitali covering theorem. They make it possible to formulate general versions of theorems on
differentiations of measure that apply in both contexts.
-/
structure VitaliFamily {m : MeasurableSpace X} (μ : Measure X) where
/-- Sets of the family "centered" at a given point. -/
setsAt : X → Set (Set X)
/-- All sets of the family are measurable. -/
measurableSet : ∀ x : X, ∀ s ∈ setsAt x, MeasurableSet s
/-- All sets of the family have nonempty interior. -/
nonempty_interior : ∀ x : X, ∀ s ∈ setsAt x, (interior s).Nonempty
/-- For any closed ball around `x`, there exists a set of the family contained in this ball. -/
nontrivial : ∀ (x : X), ∀ ε > (0 : ℝ), ∃ s ∈ setsAt x, s ⊆ closedBall x ε
/-- Consider a (possibly non-measurable) set `s`,
and for any `x` in `s` a subfamily `f x` of `setsAt x`
containing sets of arbitrarily small diameter.
Then one can extract a disjoint subfamily covering almost all `s`. -/
covering : ∀ (s : Set X) (f : X → Set (Set X)),
(∀ x ∈ s, f x ⊆ setsAt x) → (∀ x ∈ s, ∀ ε > (0 : ℝ), ∃ t ∈ f x, t ⊆ closedBall x ε) →
∃ t : Set (X × Set X), (∀ p ∈ t, p.1 ∈ s) ∧ (t.PairwiseDisjoint fun p ↦ p.2) ∧
(∀ p ∈ t, p.2 ∈ f p.1) ∧ μ (s \ ⋃ p ∈ t, p.2) = 0
namespace VitaliFamily
variable {m0 : MeasurableSpace X} {μ : Measure X}
/-- A Vitali family for a measure `μ` is also a Vitali family for any measure absolutely continuous
with respect to `μ`. -/
def mono (v : VitaliFamily μ) (ν : Measure X) (hν : ν ≪ μ) : VitaliFamily ν where
__ := v
covering s f h h' :=
let ⟨t, ts, disj, mem_f, hμ⟩ := v.covering s f h h'
⟨t, ts, disj, mem_f, hν hμ⟩
/-- Given a Vitali family `v` for a measure `μ`, a family `f` is a fine subfamily on a set `s` if
every point `x` in `s` belongs to arbitrarily small sets in `v.setsAt x ∩ f x`. This is precisely
the subfamilies for which the Vitali family definition ensures that one can extract a disjoint
covering of almost all `s`. -/
def FineSubfamilyOn (v : VitaliFamily μ) (f : X → Set (Set X)) (s : Set X) : Prop :=
∀ x ∈ s, ∀ ε > 0, ∃ t ∈ v.setsAt x ∩ f x, t ⊆ closedBall x ε
namespace FineSubfamilyOn
variable {v : VitaliFamily μ} {f : X → Set (Set X)} {s : Set X} (h : v.FineSubfamilyOn f s)
include h
theorem exists_disjoint_covering_ae :
∃ t : Set (X × Set X),
(∀ p : X × Set X, p ∈ t → p.1 ∈ s) ∧
(t.PairwiseDisjoint fun p => p.2) ∧
(∀ p : X × Set X, p ∈ t → p.2 ∈ v.setsAt p.1 ∩ f p.1) ∧
μ (s \ ⋃ (p : X × Set X) (_ : p ∈ t), p.2) = 0 :=
v.covering s (fun x => v.setsAt x ∩ f x) (fun _ _ => inter_subset_left) h
/-- Given `h : v.FineSubfamilyOn f s`, then `h.index` is a set parametrizing a disjoint
covering of almost every `s`. -/
protected def index : Set (X × Set X) :=
h.exists_disjoint_covering_ae.choose
/-- Given `h : v.FineSubfamilyOn f s`, then `h.covering p` is a set in the family,
for `p ∈ h.index`, such that these sets form a disjoint covering of almost every `s`. -/
@[nolint unusedArguments]
protected def covering (_h : FineSubfamilyOn v f s) : X × Set X → Set X :=
fun p => p.2
theorem index_subset : ∀ p : X × Set X, p ∈ h.index → p.1 ∈ s :=
h.exists_disjoint_covering_ae.choose_spec.1
theorem covering_disjoint : h.index.PairwiseDisjoint h.covering :=
h.exists_disjoint_covering_ae.choose_spec.2.1
open scoped Function in -- required for scoped `on` notation
theorem covering_disjoint_subtype : Pairwise (Disjoint on fun x : h.index => h.covering x) :=
(pairwise_subtype_iff_pairwise_set _ _).2 h.covering_disjoint
theorem covering_mem {p : X × Set X} (hp : p ∈ h.index) : h.covering p ∈ f p.1 :=
(h.exists_disjoint_covering_ae.choose_spec.2.2.1 p hp).2
theorem covering_mem_family {p : X × Set X} (hp : p ∈ h.index) : h.covering p ∈ v.setsAt p.1 :=
(h.exists_disjoint_covering_ae.choose_spec.2.2.1 p hp).1
theorem measure_diff_biUnion : μ (s \ ⋃ p ∈ h.index, h.covering p) = 0 :=
h.exists_disjoint_covering_ae.choose_spec.2.2.2
theorem index_countable [SecondCountableTopology X] : h.index.Countable :=
h.covering_disjoint.countable_of_nonempty_interior fun _ hx =>
v.nonempty_interior _ _ (h.covering_mem_family hx)
protected theorem measurableSet_u {p : X × Set X} (hp : p ∈ h.index) :
MeasurableSet (h.covering p) :=
v.measurableSet p.1 _ (h.covering_mem_family hp)
theorem measure_le_tsum_of_absolutelyContinuous [SecondCountableTopology X] {ρ : Measure X}
(hρ : ρ ≪ μ) : ρ s ≤ ∑' p : h.index, ρ (h.covering p) :=
calc
ρ s ≤ ρ ((s \ ⋃ p ∈ h.index, h.covering p) ∪ ⋃ p ∈ h.index, h.covering p) :=
measure_mono (by simp only [subset_union_left, diff_union_self])
_ ≤ ρ (s \ ⋃ p ∈ h.index, h.covering p) + ρ (⋃ p ∈ h.index, h.covering p) :=
(measure_union_le _ _)
_ = ∑' p : h.index, ρ (h.covering p) := by
rw [hρ h.measure_diff_biUnion, zero_add,
measure_biUnion h.index_countable h.covering_disjoint fun x hx => h.measurableSet_u hx]
theorem measure_le_tsum [SecondCountableTopology X] : μ s ≤ ∑' x : h.index, μ (h.covering x) :=
h.measure_le_tsum_of_absolutelyContinuous Measure.AbsolutelyContinuous.rfl
end FineSubfamilyOn
/-- One can enlarge a Vitali family by adding to the sets `f x` at `x` all sets which are not
contained in a `δ`-neighborhood on `x`. This does not change the local filter at a point, but it
can be convenient to get a nicer global behavior. -/
def enlarge (v : VitaliFamily μ) (δ : ℝ) (δpos : 0 < δ) : VitaliFamily μ where
setsAt x := v.setsAt x ∪ {s | MeasurableSet s ∧ (interior s).Nonempty ∧ ¬s ⊆ closedBall x δ}
measurableSet := by
rintro x s (hs | hs)
exacts [v.measurableSet _ _ hs, hs.1]
nonempty_interior := by
rintro x s (hs | hs)
exacts [v.nonempty_interior _ _ hs, hs.2.1]
nontrivial := by
intro x ε εpos
rcases v.nontrivial x ε εpos with ⟨s, hs, h's⟩
exact ⟨s, mem_union_left _ hs, h's⟩
covering := by
intro s f fset ffine
let g : X → Set (Set X) := fun x => f x ∩ v.setsAt x
have : ∀ x ∈ s, ∀ ε : ℝ, ε > 0 → ∃ t ∈ g x, t ⊆ closedBall x ε := by
intro x hx ε εpos
obtain ⟨t, tf, ht⟩ : ∃ t ∈ f x, t ⊆ closedBall x (min ε δ) :=
ffine x hx (min ε δ) (lt_min εpos δpos)
rcases fset x hx tf with (h't | h't)
· exact ⟨t, ⟨tf, h't⟩, ht.trans (closedBall_subset_closedBall (min_le_left _ _))⟩
· refine False.elim (h't.2.2 ?_)
exact ht.trans (closedBall_subset_closedBall (min_le_right _ _))
rcases v.covering s g (fun x _ => inter_subset_right) this with ⟨t, ts, tdisj, tg, μt⟩
exact ⟨t, ts, tdisj, fun p hp => (tg p hp).1, μt⟩
variable (v : VitaliFamily μ)
/-- Given a vitali family `v`, then `v.filterAt x` is the filter on `Set X` made of those families
that contain all sets of `v.setsAt x` of a sufficiently small diameter. This filter makes it
possible to express limiting behavior when sets in `v.setsAt x` shrink to `x`. -/
def filterAt (x : X) : Filter (Set X) := (𝓝 x).smallSets ⊓ 𝓟 (v.setsAt x)
theorem _root_.Filter.HasBasis.vitaliFamily {ι : Sort*} {p : ι → Prop} {s : ι → Set X} {x : X}
(h : (𝓝 x).HasBasis p s) : (v.filterAt x).HasBasis p (fun i ↦ {t ∈ v.setsAt x | t ⊆ s i}) := by
simpa only [← Set.setOf_inter_eq_sep] using h.smallSets.inf_principal _
theorem filterAt_basis_closedBall (x : X) :
(v.filterAt x).HasBasis (0 < ·) ({t ∈ v.setsAt x | t ⊆ closedBall x ·}) :=
nhds_basis_closedBall.vitaliFamily v
theorem mem_filterAt_iff {x : X} {s : Set (Set X)} :
s ∈ v.filterAt x ↔ ∃ ε > (0 : ℝ), ∀ t ∈ v.setsAt x, t ⊆ closedBall x ε → t ∈ s := by
simp only [(v.filterAt_basis_closedBall x).mem_iff, ← and_imp, subset_def, mem_setOf]
instance filterAt_neBot (x : X) : (v.filterAt x).NeBot :=
(v.filterAt_basis_closedBall x).neBot_iff.2 <| v.nontrivial _ _
theorem eventually_filterAt_iff {x : X} {P : Set X → Prop} :
(∀ᶠ t in v.filterAt x, P t) ↔ ∃ ε > (0 : ℝ), ∀ t ∈ v.setsAt x, t ⊆ closedBall x ε → P t :=
v.mem_filterAt_iff
theorem tendsto_filterAt_iff {ι : Type*} {l : Filter ι} {f : ι → Set X} {x : X} :
Tendsto f l (v.filterAt x) ↔
(∀ᶠ i in l, f i ∈ v.setsAt x) ∧ ∀ ε > (0 : ℝ), ∀ᶠ i in l, f i ⊆ closedBall x ε := by
simp only [filterAt, tendsto_inf, nhds_basis_closedBall.smallSets.tendsto_right_iff,
tendsto_principal, and_comm, mem_powerset_iff]
theorem eventually_filterAt_mem_setsAt (x : X) : ∀ᶠ t in v.filterAt x, t ∈ v.setsAt x :=
(v.tendsto_filterAt_iff.mp tendsto_id).1
theorem eventually_filterAt_subset_closedBall (x : X) {ε : ℝ} (hε : 0 < ε) :
∀ᶠ t : Set X in v.filterAt x, t ⊆ closedBall x ε :=
(v.tendsto_filterAt_iff.mp tendsto_id).2 ε hε
theorem eventually_filterAt_measurableSet (x : X) : ∀ᶠ t in v.filterAt x, MeasurableSet t := by
filter_upwards [v.eventually_filterAt_mem_setsAt x] with _ ha using v.measurableSet _ _ ha
theorem frequently_filterAt_iff {x : X} {P : Set X → Prop} :
(∃ᶠ t in v.filterAt x, P t) ↔ ∀ ε > (0 : ℝ), ∃ t ∈ v.setsAt x, t ⊆ closedBall x ε ∧ P t := by
simp only [(v.filterAt_basis_closedBall x).frequently_iff, ← and_assoc, subset_def, mem_setOf]
theorem eventually_filterAt_subset_of_nhds {x : X} {o : Set X} (hx : o ∈ 𝓝 x) :
∀ᶠ t in v.filterAt x, t ⊆ o :=
(eventually_smallSets_subset.2 hx).filter_mono inf_le_left
theorem fineSubfamilyOn_of_frequently (v : VitaliFamily μ) (f : X → Set (Set X)) (s : Set X)
(h : ∀ x ∈ s, ∃ᶠ t in v.filterAt x, t ∈ f x) : v.FineSubfamilyOn f s := by
intro x hx ε εpos
obtain ⟨t, tv, ht, tf⟩ : ∃ t ∈ v.setsAt x, t ⊆ closedBall x ε ∧ t ∈ f x :=
v.frequently_filterAt_iff.1 (h x hx) ε εpos
exact ⟨t, ⟨tv, tf⟩, ht⟩
end VitaliFamily
| Mathlib/MeasureTheory/Covering/VitaliFamily.lean | 268 | 270 | |
/-
Copyright (c) 2017 Johannes Hölzl. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johannes Hölzl, Mario Carneiro, Patrick Massot, Yury Kudryashov, Rémy Degenne
-/
import Mathlib.Data.Set.Subsingleton
import Mathlib.Order.Interval.Set.Defs
/-!
# Intervals
In any preorder, we define intervals (which on each side can be either infinite, open or closed)
using the following naming conventions:
- `i`: infinite
- `o`: open
- `c`: closed
Each interval has the name `I` + letter for left side + letter for right side.
For instance, `Ioc a b` denotes the interval `(a, b]`.
The definitions can be found in `Mathlib.Order.Interval.Set.Defs`.
This file contains basic facts on inclusion of and set operations on intervals
(where the precise statements depend on the order's properties;
statements requiring `LinearOrder` are in `Mathlib.Order.Interval.Set.LinearOrder`).
TODO: This is just the beginning; a lot of rules are missing
-/
assert_not_exists RelIso
open Function
open OrderDual (toDual ofDual)
variable {α : Type*}
namespace Set
section Preorder
variable [Preorder α] {a a₁ a₂ b b₁ b₂ c x : α}
instance decidableMemIoo [Decidable (a < x ∧ x < b)] : Decidable (x ∈ Ioo a b) := by assumption
instance decidableMemIco [Decidable (a ≤ x ∧ x < b)] : Decidable (x ∈ Ico a b) := by assumption
instance decidableMemIio [Decidable (x < b)] : Decidable (x ∈ Iio b) := by assumption
instance decidableMemIcc [Decidable (a ≤ x ∧ x ≤ b)] : Decidable (x ∈ Icc a b) := by assumption
instance decidableMemIic [Decidable (x ≤ b)] : Decidable (x ∈ Iic b) := by assumption
instance decidableMemIoc [Decidable (a < x ∧ x ≤ b)] : Decidable (x ∈ Ioc a b) := by assumption
instance decidableMemIci [Decidable (a ≤ x)] : Decidable (x ∈ Ici a) := by assumption
instance decidableMemIoi [Decidable (a < x)] : Decidable (x ∈ Ioi a) := by assumption
theorem left_mem_Ioo : a ∈ Ioo a b ↔ False := by simp [lt_irrefl]
theorem left_mem_Ico : a ∈ Ico a b ↔ a < b := by simp [le_refl]
theorem left_mem_Icc : a ∈ Icc a b ↔ a ≤ b := by simp [le_refl]
theorem left_mem_Ioc : a ∈ Ioc a b ↔ False := by simp [lt_irrefl]
theorem left_mem_Ici : a ∈ Ici a := by simp
theorem right_mem_Ioo : b ∈ Ioo a b ↔ False := by simp [lt_irrefl]
theorem right_mem_Ico : b ∈ Ico a b ↔ False := by simp [lt_irrefl]
theorem right_mem_Icc : b ∈ Icc a b ↔ a ≤ b := by simp [le_refl]
theorem right_mem_Ioc : b ∈ Ioc a b ↔ a < b := by simp [le_refl]
theorem right_mem_Iic : a ∈ Iic a := by simp
@[simp]
theorem Ici_toDual : Ici (toDual a) = ofDual ⁻¹' Iic a :=
rfl
@[deprecated (since := "2025-03-20")]
alias dual_Ici := Ici_toDual
@[simp]
theorem Iic_toDual : Iic (toDual a) = ofDual ⁻¹' Ici a :=
rfl
@[deprecated (since := "2025-03-20")]
alias dual_Iic := Iic_toDual
@[simp]
theorem Ioi_toDual : Ioi (toDual a) = ofDual ⁻¹' Iio a :=
rfl
@[deprecated (since := "2025-03-20")]
alias dual_Ioi := Ioi_toDual
@[simp]
theorem Iio_toDual : Iio (toDual a) = ofDual ⁻¹' Ioi a :=
rfl
@[deprecated (since := "2025-03-20")]
alias dual_Iio := Iio_toDual
@[simp]
theorem Icc_toDual : Icc (toDual a) (toDual b) = ofDual ⁻¹' Icc b a :=
Set.ext fun _ => and_comm
@[deprecated (since := "2025-03-20")]
alias dual_Icc := Icc_toDual
@[simp]
theorem Ioc_toDual : Ioc (toDual a) (toDual b) = ofDual ⁻¹' Ico b a :=
Set.ext fun _ => and_comm
@[deprecated (since := "2025-03-20")]
alias dual_Ioc := Ioc_toDual
@[simp]
theorem Ico_toDual : Ico (toDual a) (toDual b) = ofDual ⁻¹' Ioc b a :=
Set.ext fun _ => and_comm
@[deprecated (since := "2025-03-20")]
alias dual_Ico := Ico_toDual
@[simp]
theorem Ioo_toDual : Ioo (toDual a) (toDual b) = ofDual ⁻¹' Ioo b a :=
Set.ext fun _ => and_comm
@[deprecated (since := "2025-03-20")]
alias dual_Ioo := Ioo_toDual
@[simp]
theorem Ici_ofDual {x : αᵒᵈ} : Ici (ofDual x) = toDual ⁻¹' Iic x :=
rfl
@[simp]
theorem Iic_ofDual {x : αᵒᵈ} : Iic (ofDual x) = toDual ⁻¹' Ici x :=
rfl
@[simp]
theorem Ioi_ofDual {x : αᵒᵈ} : Ioi (ofDual x) = toDual ⁻¹' Iio x :=
rfl
@[simp]
theorem Iio_ofDual {x : αᵒᵈ} : Iio (ofDual x) = toDual ⁻¹' Ioi x :=
rfl
@[simp]
theorem Icc_ofDual {x y : αᵒᵈ} : Icc (ofDual y) (ofDual x) = toDual ⁻¹' Icc x y :=
Set.ext fun _ => and_comm
@[simp]
theorem Ico_ofDual {x y : αᵒᵈ} : Ico (ofDual y) (ofDual x) = toDual ⁻¹' Ioc x y :=
Set.ext fun _ => and_comm
@[simp]
theorem Ioc_ofDual {x y : αᵒᵈ} : Ioc (ofDual y) (ofDual x) = toDual ⁻¹' Ico x y :=
Set.ext fun _ => and_comm
@[simp]
theorem Ioo_ofDual {x y : αᵒᵈ} : Ioo (ofDual y) (ofDual x) = toDual ⁻¹' Ioo x y :=
Set.ext fun _ => and_comm
@[simp]
theorem nonempty_Icc : (Icc a b).Nonempty ↔ a ≤ b :=
⟨fun ⟨_, hx⟩ => hx.1.trans hx.2, fun h => ⟨a, left_mem_Icc.2 h⟩⟩
@[simp]
theorem nonempty_Ico : (Ico a b).Nonempty ↔ a < b :=
⟨fun ⟨_, hx⟩ => hx.1.trans_lt hx.2, fun h => ⟨a, left_mem_Ico.2 h⟩⟩
@[simp]
theorem nonempty_Ioc : (Ioc a b).Nonempty ↔ a < b :=
⟨fun ⟨_, hx⟩ => hx.1.trans_le hx.2, fun h => ⟨b, right_mem_Ioc.2 h⟩⟩
@[simp]
theorem nonempty_Ici : (Ici a).Nonempty :=
⟨a, left_mem_Ici⟩
@[simp]
theorem nonempty_Iic : (Iic a).Nonempty :=
⟨a, right_mem_Iic⟩
@[simp]
theorem nonempty_Ioo [DenselyOrdered α] : (Ioo a b).Nonempty ↔ a < b :=
⟨fun ⟨_, ha, hb⟩ => ha.trans hb, exists_between⟩
@[simp]
theorem nonempty_Ioi [NoMaxOrder α] : (Ioi a).Nonempty :=
exists_gt a
@[simp]
theorem nonempty_Iio [NoMinOrder α] : (Iio a).Nonempty :=
exists_lt a
theorem nonempty_Icc_subtype (h : a ≤ b) : Nonempty (Icc a b) :=
Nonempty.to_subtype (nonempty_Icc.mpr h)
theorem nonempty_Ico_subtype (h : a < b) : Nonempty (Ico a b) :=
Nonempty.to_subtype (nonempty_Ico.mpr h)
theorem nonempty_Ioc_subtype (h : a < b) : Nonempty (Ioc a b) :=
Nonempty.to_subtype (nonempty_Ioc.mpr h)
/-- An interval `Ici a` is nonempty. -/
instance nonempty_Ici_subtype : Nonempty (Ici a) :=
Nonempty.to_subtype nonempty_Ici
/-- An interval `Iic a` is nonempty. -/
instance nonempty_Iic_subtype : Nonempty (Iic a) :=
Nonempty.to_subtype nonempty_Iic
theorem nonempty_Ioo_subtype [DenselyOrdered α] (h : a < b) : Nonempty (Ioo a b) :=
Nonempty.to_subtype (nonempty_Ioo.mpr h)
/-- In an order without maximal elements, the intervals `Ioi` are nonempty. -/
instance nonempty_Ioi_subtype [NoMaxOrder α] : Nonempty (Ioi a) :=
Nonempty.to_subtype nonempty_Ioi
/-- In an order without minimal elements, the intervals `Iio` are nonempty. -/
instance nonempty_Iio_subtype [NoMinOrder α] : Nonempty (Iio a) :=
Nonempty.to_subtype nonempty_Iio
instance [NoMinOrder α] : NoMinOrder (Iio a) :=
⟨fun a =>
let ⟨b, hb⟩ := exists_lt (a : α)
⟨⟨b, lt_trans hb a.2⟩, hb⟩⟩
instance [NoMinOrder α] : NoMinOrder (Iic a) :=
⟨fun a =>
let ⟨b, hb⟩ := exists_lt (a : α)
⟨⟨b, hb.le.trans a.2⟩, hb⟩⟩
instance [NoMaxOrder α] : NoMaxOrder (Ioi a) :=
OrderDual.noMaxOrder (α := Iio (toDual a))
instance [NoMaxOrder α] : NoMaxOrder (Ici a) :=
OrderDual.noMaxOrder (α := Iic (toDual a))
@[simp]
theorem Icc_eq_empty (h : ¬a ≤ b) : Icc a b = ∅ :=
eq_empty_iff_forall_not_mem.2 fun _ ⟨ha, hb⟩ => h (ha.trans hb)
@[simp]
theorem Ico_eq_empty (h : ¬a < b) : Ico a b = ∅ :=
eq_empty_iff_forall_not_mem.2 fun _ ⟨ha, hb⟩ => h (ha.trans_lt hb)
@[simp]
theorem Ioc_eq_empty (h : ¬a < b) : Ioc a b = ∅ :=
eq_empty_iff_forall_not_mem.2 fun _ ⟨ha, hb⟩ => h (ha.trans_le hb)
@[simp]
theorem Ioo_eq_empty (h : ¬a < b) : Ioo a b = ∅ :=
eq_empty_iff_forall_not_mem.2 fun _ ⟨ha, hb⟩ => h (ha.trans hb)
@[simp]
theorem Icc_eq_empty_of_lt (h : b < a) : Icc a b = ∅ :=
Icc_eq_empty h.not_le
@[simp]
theorem Ico_eq_empty_of_le (h : b ≤ a) : Ico a b = ∅ :=
Ico_eq_empty h.not_lt
@[simp]
theorem Ioc_eq_empty_of_le (h : b ≤ a) : Ioc a b = ∅ :=
Ioc_eq_empty h.not_lt
@[simp]
theorem Ioo_eq_empty_of_le (h : b ≤ a) : Ioo a b = ∅ :=
Ioo_eq_empty h.not_lt
theorem Ico_self (a : α) : Ico a a = ∅ :=
Ico_eq_empty <| lt_irrefl _
theorem Ioc_self (a : α) : Ioc a a = ∅ :=
Ioc_eq_empty <| lt_irrefl _
theorem Ioo_self (a : α) : Ioo a a = ∅ :=
Ioo_eq_empty <| lt_irrefl _
@[simp]
theorem Ici_subset_Ici : Ici a ⊆ Ici b ↔ b ≤ a :=
⟨fun h => h <| left_mem_Ici, fun h _ hx => h.trans hx⟩
@[gcongr] alias ⟨_, _root_.GCongr.Ici_subset_Ici_of_le⟩ := Ici_subset_Ici
@[simp]
theorem Ici_ssubset_Ici : Ici a ⊂ Ici b ↔ b < a where
mp h := by
obtain ⟨ab, c, cb, ac⟩ := ssubset_iff_exists.mp h
exact lt_of_le_not_le (Ici_subset_Ici.mp ab) (fun h' ↦ ac (h'.trans cb))
mpr h := (ssubset_iff_of_subset (Ici_subset_Ici.mpr h.le)).mpr
⟨b, right_mem_Iic, fun h' => h.not_le h'⟩
@[gcongr] alias ⟨_, _root_.GCongr.Ici_ssubset_Ici_of_le⟩ := Ici_ssubset_Ici
@[simp]
theorem Iic_subset_Iic : Iic a ⊆ Iic b ↔ a ≤ b :=
@Ici_subset_Ici αᵒᵈ _ _ _
@[gcongr] alias ⟨_, _root_.GCongr.Iic_subset_Iic_of_le⟩ := Iic_subset_Iic
@[simp]
theorem Iic_ssubset_Iic : Iic a ⊂ Iic b ↔ a < b :=
@Ici_ssubset_Ici αᵒᵈ _ _ _
@[gcongr] alias ⟨_, _root_.GCongr.Iic_ssubset_Iic_of_le⟩ := Iic_ssubset_Iic
@[simp]
theorem Ici_subset_Ioi : Ici a ⊆ Ioi b ↔ b < a :=
⟨fun h => h left_mem_Ici, fun h _ hx => h.trans_le hx⟩
@[simp]
theorem Iic_subset_Iio : Iic a ⊆ Iio b ↔ a < b :=
⟨fun h => h right_mem_Iic, fun h _ hx => lt_of_le_of_lt hx h⟩
@[gcongr]
theorem Ioo_subset_Ioo (h₁ : a₂ ≤ a₁) (h₂ : b₁ ≤ b₂) : Ioo a₁ b₁ ⊆ Ioo a₂ b₂ := fun _ ⟨hx₁, hx₂⟩ =>
⟨h₁.trans_lt hx₁, hx₂.trans_le h₂⟩
@[gcongr]
theorem Ioo_subset_Ioo_left (h : a₁ ≤ a₂) : Ioo a₂ b ⊆ Ioo a₁ b :=
Ioo_subset_Ioo h le_rfl
@[gcongr]
theorem Ioo_subset_Ioo_right (h : b₁ ≤ b₂) : Ioo a b₁ ⊆ Ioo a b₂ :=
Ioo_subset_Ioo le_rfl h
@[gcongr]
theorem Ico_subset_Ico (h₁ : a₂ ≤ a₁) (h₂ : b₁ ≤ b₂) : Ico a₁ b₁ ⊆ Ico a₂ b₂ := fun _ ⟨hx₁, hx₂⟩ =>
⟨h₁.trans hx₁, hx₂.trans_le h₂⟩
@[gcongr]
theorem Ico_subset_Ico_left (h : a₁ ≤ a₂) : Ico a₂ b ⊆ Ico a₁ b :=
Ico_subset_Ico h le_rfl
@[gcongr]
theorem Ico_subset_Ico_right (h : b₁ ≤ b₂) : Ico a b₁ ⊆ Ico a b₂ :=
Ico_subset_Ico le_rfl h
@[gcongr]
theorem Icc_subset_Icc (h₁ : a₂ ≤ a₁) (h₂ : b₁ ≤ b₂) : Icc a₁ b₁ ⊆ Icc a₂ b₂ := fun _ ⟨hx₁, hx₂⟩ =>
⟨h₁.trans hx₁, le_trans hx₂ h₂⟩
@[gcongr]
theorem Icc_subset_Icc_left (h : a₁ ≤ a₂) : Icc a₂ b ⊆ Icc a₁ b :=
Icc_subset_Icc h le_rfl
@[gcongr]
theorem Icc_subset_Icc_right (h : b₁ ≤ b₂) : Icc a b₁ ⊆ Icc a b₂ :=
Icc_subset_Icc le_rfl h
theorem Icc_subset_Ioo (ha : a₂ < a₁) (hb : b₁ < b₂) : Icc a₁ b₁ ⊆ Ioo a₂ b₂ := fun _ hx =>
⟨ha.trans_le hx.1, hx.2.trans_lt hb⟩
theorem Icc_subset_Ici_self : Icc a b ⊆ Ici a := fun _ => And.left
theorem Icc_subset_Iic_self : Icc a b ⊆ Iic b := fun _ => And.right
theorem Ioc_subset_Iic_self : Ioc a b ⊆ Iic b := fun _ => And.right
@[gcongr]
theorem Ioc_subset_Ioc (h₁ : a₂ ≤ a₁) (h₂ : b₁ ≤ b₂) : Ioc a₁ b₁ ⊆ Ioc a₂ b₂ := fun _ ⟨hx₁, hx₂⟩ =>
⟨h₁.trans_lt hx₁, hx₂.trans h₂⟩
@[gcongr]
theorem Ioc_subset_Ioc_left (h : a₁ ≤ a₂) : Ioc a₂ b ⊆ Ioc a₁ b :=
Ioc_subset_Ioc h le_rfl
@[gcongr]
theorem Ioc_subset_Ioc_right (h : b₁ ≤ b₂) : Ioc a b₁ ⊆ Ioc a b₂ :=
Ioc_subset_Ioc le_rfl h
theorem Ico_subset_Ioo_left (h₁ : a₁ < a₂) : Ico a₂ b ⊆ Ioo a₁ b := fun _ =>
And.imp_left h₁.trans_le
theorem Ioc_subset_Ioo_right (h : b₁ < b₂) : Ioc a b₁ ⊆ Ioo a b₂ := fun _ =>
And.imp_right fun h' => h'.trans_lt h
theorem Icc_subset_Ico_right (h₁ : b₁ < b₂) : Icc a b₁ ⊆ Ico a b₂ := fun _ =>
And.imp_right fun h₂ => h₂.trans_lt h₁
theorem Ioo_subset_Ico_self : Ioo a b ⊆ Ico a b := fun _ => And.imp_left le_of_lt
theorem Ioo_subset_Ioc_self : Ioo a b ⊆ Ioc a b := fun _ => And.imp_right le_of_lt
theorem Ico_subset_Icc_self : Ico a b ⊆ Icc a b := fun _ => And.imp_right le_of_lt
theorem Ioc_subset_Icc_self : Ioc a b ⊆ Icc a b := fun _ => And.imp_left le_of_lt
theorem Ioo_subset_Icc_self : Ioo a b ⊆ Icc a b :=
Subset.trans Ioo_subset_Ico_self Ico_subset_Icc_self
theorem Ico_subset_Iio_self : Ico a b ⊆ Iio b := fun _ => And.right
theorem Ioo_subset_Iio_self : Ioo a b ⊆ Iio b := fun _ => And.right
theorem Ioc_subset_Ioi_self : Ioc a b ⊆ Ioi a := fun _ => And.left
theorem Ioo_subset_Ioi_self : Ioo a b ⊆ Ioi a := fun _ => And.left
theorem Ioi_subset_Ici_self : Ioi a ⊆ Ici a := fun _ hx => le_of_lt hx
theorem Iio_subset_Iic_self : Iio a ⊆ Iic a := fun _ hx => le_of_lt hx
theorem Ico_subset_Ici_self : Ico a b ⊆ Ici a := fun _ => And.left
theorem Ioi_ssubset_Ici_self : Ioi a ⊂ Ici a :=
⟨Ioi_subset_Ici_self, fun h => lt_irrefl a (h le_rfl)⟩
theorem Iio_ssubset_Iic_self : Iio a ⊂ Iic a :=
@Ioi_ssubset_Ici_self αᵒᵈ _ _
theorem Icc_subset_Icc_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Icc a₂ b₂ ↔ a₂ ≤ a₁ ∧ b₁ ≤ b₂ :=
⟨fun h => ⟨(h ⟨le_rfl, h₁⟩).1, (h ⟨h₁, le_rfl⟩).2⟩, fun ⟨h, h'⟩ _ ⟨hx, hx'⟩ =>
⟨h.trans hx, hx'.trans h'⟩⟩
theorem Icc_subset_Ioo_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Ioo a₂ b₂ ↔ a₂ < a₁ ∧ b₁ < b₂ :=
⟨fun h => ⟨(h ⟨le_rfl, h₁⟩).1, (h ⟨h₁, le_rfl⟩).2⟩, fun ⟨h, h'⟩ _ ⟨hx, hx'⟩ =>
⟨h.trans_le hx, hx'.trans_lt h'⟩⟩
theorem Icc_subset_Ico_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Ico a₂ b₂ ↔ a₂ ≤ a₁ ∧ b₁ < b₂ :=
⟨fun h => ⟨(h ⟨le_rfl, h₁⟩).1, (h ⟨h₁, le_rfl⟩).2⟩, fun ⟨h, h'⟩ _ ⟨hx, hx'⟩ =>
⟨h.trans hx, hx'.trans_lt h'⟩⟩
theorem Icc_subset_Ioc_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Ioc a₂ b₂ ↔ a₂ < a₁ ∧ b₁ ≤ b₂ :=
⟨fun h => ⟨(h ⟨le_rfl, h₁⟩).1, (h ⟨h₁, le_rfl⟩).2⟩, fun ⟨h, h'⟩ _ ⟨hx, hx'⟩ =>
⟨h.trans_le hx, hx'.trans h'⟩⟩
theorem Icc_subset_Iio_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Iio b₂ ↔ b₁ < b₂ :=
⟨fun h => h ⟨h₁, le_rfl⟩, fun h _ ⟨_, hx'⟩ => hx'.trans_lt h⟩
theorem Icc_subset_Ioi_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Ioi a₂ ↔ a₂ < a₁ :=
⟨fun h => h ⟨le_rfl, h₁⟩, fun h _ ⟨hx, _⟩ => h.trans_le hx⟩
theorem Icc_subset_Iic_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Iic b₂ ↔ b₁ ≤ b₂ :=
⟨fun h => h ⟨h₁, le_rfl⟩, fun h _ ⟨_, hx'⟩ => hx'.trans h⟩
theorem Icc_subset_Ici_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Ici a₂ ↔ a₂ ≤ a₁ :=
⟨fun h => h ⟨le_rfl, h₁⟩, fun h _ ⟨hx, _⟩ => h.trans hx⟩
theorem Icc_ssubset_Icc_left (hI : a₂ ≤ b₂) (ha : a₂ < a₁) (hb : b₁ ≤ b₂) : Icc a₁ b₁ ⊂ Icc a₂ b₂ :=
(ssubset_iff_of_subset (Icc_subset_Icc (le_of_lt ha) hb)).mpr
⟨a₂, left_mem_Icc.mpr hI, not_and.mpr fun f _ => lt_irrefl a₂ (ha.trans_le f)⟩
theorem Icc_ssubset_Icc_right (hI : a₂ ≤ b₂) (ha : a₂ ≤ a₁) (hb : b₁ < b₂) :
Icc a₁ b₁ ⊂ Icc a₂ b₂ :=
(ssubset_iff_of_subset (Icc_subset_Icc ha (le_of_lt hb))).mpr
⟨b₂, right_mem_Icc.mpr hI, fun f => lt_irrefl b₁ (hb.trans_le f.2)⟩
/-- If `a ≤ b`, then `(b, +∞) ⊆ (a, +∞)`. In preorders, this is just an implication. If you need
the equivalence in linear orders, use `Ioi_subset_Ioi_iff`. -/
@[gcongr]
theorem Ioi_subset_Ioi (h : a ≤ b) : Ioi b ⊆ Ioi a := fun _ hx => h.trans_lt hx
/-- If `a < b`, then `(b, +∞) ⊂ (a, +∞)`. In preorders, this is just an implication. If you need
the equivalence in linear orders, use `Ioi_ssubset_Ioi_iff`. -/
@[gcongr]
theorem Ioi_ssubset_Ioi (h : a < b) : Ioi b ⊂ Ioi a :=
(ssubset_iff_of_subset (Ioi_subset_Ioi h.le)).mpr ⟨b, h, lt_irrefl b⟩
/-- If `a ≤ b`, then `(b, +∞) ⊆ [a, +∞)`. In preorders, this is just an implication. If you need
the equivalence in dense linear orders, use `Ioi_subset_Ici_iff`. -/
theorem Ioi_subset_Ici (h : a ≤ b) : Ioi b ⊆ Ici a :=
Subset.trans (Ioi_subset_Ioi h) Ioi_subset_Ici_self
/-- If `a ≤ b`, then `(-∞, a) ⊆ (-∞, b)`. In preorders, this is just an implication. If you need
the equivalence in linear orders, use `Iio_subset_Iio_iff`. -/
@[gcongr]
theorem Iio_subset_Iio (h : a ≤ b) : Iio a ⊆ Iio b := fun _ hx => lt_of_lt_of_le hx h
/-- If `a < b`, then `(-∞, a) ⊂ (-∞, b)`. In preorders, this is just an implication. If you need
the equivalence in linear orders, use `Iio_ssubset_Iio_iff`. -/
@[gcongr]
theorem Iio_ssubset_Iio (h : a < b) : Iio a ⊂ Iio b :=
(ssubset_iff_of_subset (Iio_subset_Iio h.le)).mpr ⟨a, h, lt_irrefl a⟩
/-- If `a ≤ b`, then `(-∞, a) ⊆ (-∞, b]`. In preorders, this is just an implication. If you need
the equivalence in dense linear orders, use `Iio_subset_Iic_iff`. -/
theorem Iio_subset_Iic (h : a ≤ b) : Iio a ⊆ Iic b :=
Subset.trans (Iio_subset_Iio h) Iio_subset_Iic_self
theorem Ici_inter_Iic : Ici a ∩ Iic b = Icc a b :=
rfl
theorem Ici_inter_Iio : Ici a ∩ Iio b = Ico a b :=
rfl
theorem Ioi_inter_Iic : Ioi a ∩ Iic b = Ioc a b :=
rfl
theorem Ioi_inter_Iio : Ioi a ∩ Iio b = Ioo a b :=
rfl
theorem Iic_inter_Ici : Iic a ∩ Ici b = Icc b a :=
inter_comm _ _
theorem Iio_inter_Ici : Iio a ∩ Ici b = Ico b a :=
inter_comm _ _
theorem Iic_inter_Ioi : Iic a ∩ Ioi b = Ioc b a :=
inter_comm _ _
theorem Iio_inter_Ioi : Iio a ∩ Ioi b = Ioo b a :=
inter_comm _ _
theorem mem_Icc_of_Ioo (h : x ∈ Ioo a b) : x ∈ Icc a b :=
Ioo_subset_Icc_self h
theorem mem_Ico_of_Ioo (h : x ∈ Ioo a b) : x ∈ Ico a b :=
Ioo_subset_Ico_self h
theorem mem_Ioc_of_Ioo (h : x ∈ Ioo a b) : x ∈ Ioc a b :=
Ioo_subset_Ioc_self h
theorem mem_Icc_of_Ico (h : x ∈ Ico a b) : x ∈ Icc a b :=
Ico_subset_Icc_self h
theorem mem_Icc_of_Ioc (h : x ∈ Ioc a b) : x ∈ Icc a b :=
Ioc_subset_Icc_self h
theorem mem_Ici_of_Ioi (h : x ∈ Ioi a) : x ∈ Ici a :=
Ioi_subset_Ici_self h
theorem mem_Iic_of_Iio (h : x ∈ Iio a) : x ∈ Iic a :=
Iio_subset_Iic_self h
theorem Icc_eq_empty_iff : Icc a b = ∅ ↔ ¬a ≤ b := by
rw [← not_nonempty_iff_eq_empty, not_iff_not, nonempty_Icc]
theorem Ico_eq_empty_iff : Ico a b = ∅ ↔ ¬a < b := by
rw [← not_nonempty_iff_eq_empty, not_iff_not, nonempty_Ico]
theorem Ioc_eq_empty_iff : Ioc a b = ∅ ↔ ¬a < b := by
rw [← not_nonempty_iff_eq_empty, not_iff_not, nonempty_Ioc]
theorem Ioo_eq_empty_iff [DenselyOrdered α] : Ioo a b = ∅ ↔ ¬a < b := by
rw [← not_nonempty_iff_eq_empty, not_iff_not, nonempty_Ioo]
theorem _root_.IsTop.Iic_eq (h : IsTop a) : Iic a = univ :=
eq_univ_of_forall h
theorem _root_.IsBot.Ici_eq (h : IsBot a) : Ici a = univ :=
eq_univ_of_forall h
@[simp] theorem Ioi_eq_empty_iff : Ioi a = ∅ ↔ IsMax a := by
simp only [isMax_iff_forall_not_lt, eq_empty_iff_forall_not_mem, mem_Ioi]
@[simp] theorem Iio_eq_empty_iff : Iio a = ∅ ↔ IsMin a := Ioi_eq_empty_iff (α := αᵒᵈ)
@[simp] alias ⟨_, _root_.IsMax.Ioi_eq⟩ := Ioi_eq_empty_iff
@[simp] alias ⟨_, _root_.IsMin.Iio_eq⟩ := Iio_eq_empty_iff
@[simp] lemma Iio_nonempty : (Iio a).Nonempty ↔ ¬ IsMin a := by simp [nonempty_iff_ne_empty]
@[simp] lemma Ioi_nonempty : (Ioi a).Nonempty ↔ ¬ IsMax a := by simp [nonempty_iff_ne_empty]
theorem Iic_inter_Ioc_of_le (h : a ≤ c) : Iic a ∩ Ioc b c = Ioc b a :=
ext fun _ => ⟨fun H => ⟨H.2.1, H.1⟩, fun H => ⟨H.2, H.1, H.2.trans h⟩⟩
theorem not_mem_Icc_of_lt (ha : c < a) : c ∉ Icc a b := fun h => ha.not_le h.1
theorem not_mem_Icc_of_gt (hb : b < c) : c ∉ Icc a b := fun h => hb.not_le h.2
theorem not_mem_Ico_of_lt (ha : c < a) : c ∉ Ico a b := fun h => ha.not_le h.1
theorem not_mem_Ioc_of_gt (hb : b < c) : c ∉ Ioc a b := fun h => hb.not_le h.2
theorem not_mem_Ioi_self : a ∉ Ioi a := lt_irrefl _
theorem not_mem_Iio_self : b ∉ Iio b := lt_irrefl _
theorem not_mem_Ioc_of_le (ha : c ≤ a) : c ∉ Ioc a b := fun h => lt_irrefl _ <| h.1.trans_le ha
theorem not_mem_Ico_of_ge (hb : b ≤ c) : c ∉ Ico a b := fun h => lt_irrefl _ <| h.2.trans_le hb
theorem not_mem_Ioo_of_le (ha : c ≤ a) : c ∉ Ioo a b := fun h => lt_irrefl _ <| h.1.trans_le ha
theorem not_mem_Ioo_of_ge (hb : b ≤ c) : c ∉ Ioo a b := fun h => lt_irrefl _ <| h.2.trans_le hb
section matched_intervals
@[simp] theorem Icc_eq_Ioc_same_iff : Icc a b = Ioc a b ↔ ¬a ≤ b where
mp h := by simpa using Set.ext_iff.mp h a
mpr h := by rw [Icc_eq_empty h, Ioc_eq_empty (mt le_of_lt h)]
@[simp] theorem Icc_eq_Ico_same_iff : Icc a b = Ico a b ↔ ¬a ≤ b where
mp h := by simpa using Set.ext_iff.mp h b
mpr h := by rw [Icc_eq_empty h, Ico_eq_empty (mt le_of_lt h)]
@[simp] theorem Icc_eq_Ioo_same_iff : Icc a b = Ioo a b ↔ ¬a ≤ b where
mp h := by simpa using Set.ext_iff.mp h b
mpr h := by rw [Icc_eq_empty h, Ioo_eq_empty (mt le_of_lt h)]
@[simp] theorem Ioc_eq_Ico_same_iff : Ioc a b = Ico a b ↔ ¬a < b where
mp h := by simpa using Set.ext_iff.mp h a
mpr h := by rw [Ioc_eq_empty h, Ico_eq_empty h]
@[simp] theorem Ioo_eq_Ioc_same_iff : Ioo a b = Ioc a b ↔ ¬a < b where
mp h := by simpa using Set.ext_iff.mp h b
mpr h := by rw [Ioo_eq_empty h, Ioc_eq_empty h]
@[simp] theorem Ioo_eq_Ico_same_iff : Ioo a b = Ico a b ↔ ¬a < b where
mp h := by simpa using Set.ext_iff.mp h a
mpr h := by rw [Ioo_eq_empty h, Ico_eq_empty h]
-- Mirrored versions of the above for `simp`.
@[simp] theorem Ioc_eq_Icc_same_iff : Ioc a b = Icc a b ↔ ¬a ≤ b :=
eq_comm.trans Icc_eq_Ioc_same_iff
@[simp] theorem Ico_eq_Icc_same_iff : Ico a b = Icc a b ↔ ¬a ≤ b :=
eq_comm.trans Icc_eq_Ico_same_iff
@[simp] theorem Ioo_eq_Icc_same_iff : Ioo a b = Icc a b ↔ ¬a ≤ b :=
eq_comm.trans Icc_eq_Ioo_same_iff
@[simp] theorem Ico_eq_Ioc_same_iff : Ico a b = Ioc a b ↔ ¬a < b :=
eq_comm.trans Ioc_eq_Ico_same_iff
@[simp] theorem Ioc_eq_Ioo_same_iff : Ioc a b = Ioo a b ↔ ¬a < b :=
eq_comm.trans Ioo_eq_Ioc_same_iff
@[simp] theorem Ico_eq_Ioo_same_iff : Ico a b = Ioo a b ↔ ¬a < b :=
eq_comm.trans Ioo_eq_Ico_same_iff
end matched_intervals
end Preorder
section PartialOrder
variable [PartialOrder α] {a b c : α}
@[simp]
theorem Icc_self (a : α) : Icc a a = {a} :=
Set.ext <| by simp [Icc, le_antisymm_iff, and_comm]
instance instIccUnique : Unique (Set.Icc a a) where
default := ⟨a, by simp⟩
uniq y := Subtype.ext <| by simpa using y.2
@[simp]
theorem Icc_eq_singleton_iff : Icc a b = {c} ↔ a = c ∧ b = c := by
refine ⟨fun h => ?_, ?_⟩
· have hab : a ≤ b := nonempty_Icc.1 (h.symm.subst <| singleton_nonempty c)
exact
⟨eq_of_mem_singleton <| h ▸ left_mem_Icc.2 hab,
eq_of_mem_singleton <| h ▸ right_mem_Icc.2 hab⟩
· rintro ⟨rfl, rfl⟩
exact Icc_self _
lemma subsingleton_Icc_of_ge (hba : b ≤ a) : Set.Subsingleton (Icc a b) :=
fun _x ⟨hax, hxb⟩ _y ⟨hay, hyb⟩ ↦ le_antisymm
(le_implies_le_of_le_of_le hxb hay hba) (le_implies_le_of_le_of_le hyb hax hba)
@[simp] lemma subsingleton_Icc_iff {α : Type*} [LinearOrder α] {a b : α} :
Set.Subsingleton (Icc a b) ↔ b ≤ a := by
refine ⟨fun h ↦ ?_, subsingleton_Icc_of_ge⟩
contrapose! h
simp only [gt_iff_lt, not_subsingleton_iff]
exact ⟨a, ⟨le_refl _, h.le⟩, b, ⟨h.le, le_refl _⟩, h.ne⟩
@[simp]
theorem Icc_diff_left : Icc a b \ {a} = Ioc a b :=
ext fun x => by simp [lt_iff_le_and_ne, eq_comm, and_right_comm]
@[simp]
theorem Icc_diff_right : Icc a b \ {b} = Ico a b :=
ext fun x => by simp [lt_iff_le_and_ne, and_assoc]
@[simp]
theorem Ico_diff_left : Ico a b \ {a} = Ioo a b :=
ext fun x => by simp [and_right_comm, ← lt_iff_le_and_ne, eq_comm]
@[simp]
theorem Ioc_diff_right : Ioc a b \ {b} = Ioo a b :=
ext fun x => by simp [and_assoc, ← lt_iff_le_and_ne]
@[simp]
theorem Icc_diff_both : Icc a b \ {a, b} = Ioo a b := by
rw [insert_eq, ← diff_diff, Icc_diff_left, Ioc_diff_right]
@[simp]
theorem Ici_diff_left : Ici a \ {a} = Ioi a :=
ext fun x => by simp [lt_iff_le_and_ne, eq_comm]
@[simp]
theorem Iic_diff_right : Iic a \ {a} = Iio a :=
ext fun x => by simp [lt_iff_le_and_ne]
@[simp]
theorem Ico_diff_Ioo_same (h : a < b) : Ico a b \ Ioo a b = {a} := by
rw [← Ico_diff_left, diff_diff_cancel_left (singleton_subset_iff.2 <| left_mem_Ico.2 h)]
@[simp]
theorem Ioc_diff_Ioo_same (h : a < b) : Ioc a b \ Ioo a b = {b} := by
rw [← Ioc_diff_right, diff_diff_cancel_left (singleton_subset_iff.2 <| right_mem_Ioc.2 h)]
@[simp]
theorem Icc_diff_Ico_same (h : a ≤ b) : Icc a b \ Ico a b = {b} := by
rw [← Icc_diff_right, diff_diff_cancel_left (singleton_subset_iff.2 <| right_mem_Icc.2 h)]
@[simp]
theorem Icc_diff_Ioc_same (h : a ≤ b) : Icc a b \ Ioc a b = {a} := by
rw [← Icc_diff_left, diff_diff_cancel_left (singleton_subset_iff.2 <| left_mem_Icc.2 h)]
@[simp]
theorem Icc_diff_Ioo_same (h : a ≤ b) : Icc a b \ Ioo a b = {a, b} := by
rw [← Icc_diff_both, diff_diff_cancel_left]
simp [insert_subset_iff, h]
@[simp]
theorem Ici_diff_Ioi_same : Ici a \ Ioi a = {a} := by
rw [← Ici_diff_left, diff_diff_cancel_left (singleton_subset_iff.2 left_mem_Ici)]
@[simp]
theorem Iic_diff_Iio_same : Iic a \ Iio a = {a} := by
rw [← Iic_diff_right, diff_diff_cancel_left (singleton_subset_iff.2 right_mem_Iic)]
theorem Ioi_union_left : Ioi a ∪ {a} = Ici a :=
ext fun x => by simp [eq_comm, le_iff_eq_or_lt]
theorem Iio_union_right : Iio a ∪ {a} = Iic a :=
ext fun _ => le_iff_lt_or_eq.symm
theorem Ioo_union_left (hab : a < b) : Ioo a b ∪ {a} = Ico a b := by
rw [← Ico_diff_left, diff_union_self,
union_eq_self_of_subset_right (singleton_subset_iff.2 <| left_mem_Ico.2 hab)]
theorem Ioo_union_right (hab : a < b) : Ioo a b ∪ {b} = Ioc a b := by
simpa only [Ioo_toDual, Ico_toDual] using Ioo_union_left hab.dual
theorem Ioo_union_both (h : a ≤ b) : Ioo a b ∪ {a, b} = Icc a b := by
have : (Icc a b \ {a, b}) ∪ {a, b} = Icc a b := diff_union_of_subset fun
| x, .inl rfl => left_mem_Icc.mpr h
| x, .inr rfl => right_mem_Icc.mpr h
rw [← this, Icc_diff_both]
theorem Ioc_union_left (hab : a ≤ b) : Ioc a b ∪ {a} = Icc a b := by
rw [← Icc_diff_left, diff_union_self,
union_eq_self_of_subset_right (singleton_subset_iff.2 <| left_mem_Icc.2 hab)]
theorem Ico_union_right (hab : a ≤ b) : Ico a b ∪ {b} = Icc a b := by
simpa only [Ioc_toDual, Icc_toDual] using Ioc_union_left hab.dual
@[simp]
theorem Ico_insert_right (h : a ≤ b) : insert b (Ico a b) = Icc a b := by
rw [insert_eq, union_comm, Ico_union_right h]
@[simp]
theorem Ioc_insert_left (h : a ≤ b) : insert a (Ioc a b) = Icc a b := by
rw [insert_eq, union_comm, Ioc_union_left h]
@[simp]
theorem Ioo_insert_left (h : a < b) : insert a (Ioo a b) = Ico a b := by
rw [insert_eq, union_comm, Ioo_union_left h]
@[simp]
theorem Ioo_insert_right (h : a < b) : insert b (Ioo a b) = Ioc a b := by
rw [insert_eq, union_comm, Ioo_union_right h]
@[simp]
theorem Iio_insert : insert a (Iio a) = Iic a :=
ext fun _ => le_iff_eq_or_lt.symm
@[simp]
theorem Ioi_insert : insert a (Ioi a) = Ici a :=
ext fun _ => (or_congr_left eq_comm).trans le_iff_eq_or_lt.symm
theorem mem_Ici_Ioi_of_subset_of_subset {s : Set α} (ho : Ioi a ⊆ s) (hc : s ⊆ Ici a) :
s ∈ ({Ici a, Ioi a} : Set (Set α)) :=
by_cases
(fun h : a ∈ s =>
Or.inl <| Subset.antisymm hc <| by rw [← Ioi_union_left, union_subset_iff]; simp [*])
fun h =>
Or.inr <| Subset.antisymm (fun _ hx => lt_of_le_of_ne (hc hx) fun heq => h <| heq.symm ▸ hx) ho
theorem mem_Iic_Iio_of_subset_of_subset {s : Set α} (ho : Iio a ⊆ s) (hc : s ⊆ Iic a) :
s ∈ ({Iic a, Iio a} : Set (Set α)) :=
@mem_Ici_Ioi_of_subset_of_subset αᵒᵈ _ a s ho hc
theorem mem_Icc_Ico_Ioc_Ioo_of_subset_of_subset {s : Set α} (ho : Ioo a b ⊆ s) (hc : s ⊆ Icc a b) :
s ∈ ({Icc a b, Ico a b, Ioc a b, Ioo a b} : Set (Set α)) := by
classical
by_cases ha : a ∈ s <;> by_cases hb : b ∈ s
· refine Or.inl (Subset.antisymm hc ?_)
rwa [← Ico_diff_left, diff_singleton_subset_iff, insert_eq_of_mem ha, ← Icc_diff_right,
diff_singleton_subset_iff, insert_eq_of_mem hb] at ho
· refine Or.inr <| Or.inl <| Subset.antisymm ?_ ?_
· rw [← Icc_diff_right]
exact subset_diff_singleton hc hb
· rwa [← Ico_diff_left, diff_singleton_subset_iff, insert_eq_of_mem ha] at ho
· refine Or.inr <| Or.inr <| Or.inl <| Subset.antisymm ?_ ?_
· rw [← Icc_diff_left]
exact subset_diff_singleton hc ha
· rwa [← Ioc_diff_right, diff_singleton_subset_iff, insert_eq_of_mem hb] at ho
· refine Or.inr <| Or.inr <| Or.inr <| Subset.antisymm ?_ ho
rw [← Ico_diff_left, ← Icc_diff_right]
apply_rules [subset_diff_singleton]
theorem eq_left_or_mem_Ioo_of_mem_Ico {x : α} (hmem : x ∈ Ico a b) : x = a ∨ x ∈ Ioo a b :=
hmem.1.eq_or_gt.imp_right fun h => ⟨h, hmem.2⟩
theorem eq_right_or_mem_Ioo_of_mem_Ioc {x : α} (hmem : x ∈ Ioc a b) : x = b ∨ x ∈ Ioo a b :=
hmem.2.eq_or_lt.imp_right <| And.intro hmem.1
theorem eq_endpoints_or_mem_Ioo_of_mem_Icc {x : α} (hmem : x ∈ Icc a b) :
x = a ∨ x = b ∨ x ∈ Ioo a b :=
hmem.1.eq_or_gt.imp_right fun h => eq_right_or_mem_Ioo_of_mem_Ioc ⟨h, hmem.2⟩
theorem _root_.IsMax.Ici_eq (h : IsMax a) : Ici a = {a} :=
eq_singleton_iff_unique_mem.2 ⟨left_mem_Ici, fun _ => h.eq_of_ge⟩
theorem _root_.IsMin.Iic_eq (h : IsMin a) : Iic a = {a} :=
h.toDual.Ici_eq
theorem Ici_injective : Injective (Ici : α → Set α) := fun _ _ =>
eq_of_forall_ge_iff ∘ Set.ext_iff.1
theorem Iic_injective : Injective (Iic : α → Set α) := fun _ _ =>
eq_of_forall_le_iff ∘ Set.ext_iff.1
theorem Ici_inj : Ici a = Ici b ↔ a = b :=
Ici_injective.eq_iff
theorem Iic_inj : Iic a = Iic b ↔ a = b :=
Iic_injective.eq_iff
@[simp]
theorem Icc_inter_Icc_eq_singleton (hab : a ≤ b) (hbc : b ≤ c) : Icc a b ∩ Icc b c = {b} := by
rw [← Ici_inter_Iic, ← Iic_inter_Ici, inter_inter_inter_comm, Iic_inter_Ici]
simp [hab, hbc]
lemma Icc_eq_Icc_iff {d : α} (h : a ≤ b) :
Icc a b = Icc c d ↔ a = c ∧ b = d := by
refine ⟨fun heq ↦ ?_, by rintro ⟨rfl, rfl⟩; rfl⟩
have h' : c ≤ d := by
by_contra contra; rw [Icc_eq_empty_iff.mpr contra, Icc_eq_empty_iff] at heq; contradiction
simp only [Set.ext_iff, mem_Icc] at heq
obtain ⟨-, h₁⟩ := (heq b).mp ⟨h, le_refl _⟩
obtain ⟨h₂, -⟩ := (heq a).mp ⟨le_refl _, h⟩
obtain ⟨h₃, -⟩ := (heq c).mpr ⟨le_refl _, h'⟩
obtain ⟨-, h₄⟩ := (heq d).mpr ⟨h', le_refl _⟩
exact ⟨le_antisymm h₃ h₂, le_antisymm h₁ h₄⟩
end PartialOrder
section OrderTop
@[simp]
theorem Ici_top [PartialOrder α] [OrderTop α] : Ici (⊤ : α) = {⊤} :=
isMax_top.Ici_eq
variable [Preorder α] [OrderTop α] {a : α}
theorem Ioi_top : Ioi (⊤ : α) = ∅ :=
isMax_top.Ioi_eq
@[simp]
theorem Iic_top : Iic (⊤ : α) = univ :=
isTop_top.Iic_eq
@[simp]
theorem Icc_top : Icc a ⊤ = Ici a := by simp [← Ici_inter_Iic]
@[simp]
theorem Ioc_top : Ioc a ⊤ = Ioi a := by simp [← Ioi_inter_Iic]
end OrderTop
section OrderBot
| @[simp]
theorem Iic_bot [PartialOrder α] [OrderBot α] : Iic (⊥ : α) = {⊥} :=
| Mathlib/Order/Interval/Set/Basic.lean | 877 | 878 |
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