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/-
Copyright (c) 2017 Johannes Hölzl. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johannes Hölzl, Johan Commelin, Mario Carneiro
-/
import Mathlib.Data.Finsupp.Lex
import Mathlib.Algebra.MvPolynomial.Degrees
/-!
# Variables of polynomials
This file establishes many results about the variable sets of a multivariate polynomial.
The *variable set* of a polynomial $P \in R[X]$ is a `Finset` containing each $x \in X$
that appears in a monomial in $P$.
## Main declarations
* `MvPolynomial.vars p` : the finset of variables occurring in `p`.
For example if `p = x⁴y+yz` then `vars p = {x, y, z}`
## Notation
As in other polynomial files, we typically use the notation:
+ `σ τ : Type*` (indexing the variables)
+ `R : Type*` `[CommSemiring R]` (the coefficients)
+ `s : σ →₀ ℕ`, a function from `σ` to `ℕ` which is zero away from a finite set.
This will give rise to a monomial in `MvPolynomial σ R` which mathematicians might call `X^s`
+ `r : R`
+ `i : σ`, with corresponding monomial `X i`, often denoted `X_i` by mathematicians
+ `p : MvPolynomial σ R`
-/
noncomputable section
open Set Function Finsupp AddMonoidAlgebra
universe u v w
variable {R : Type u} {S : Type v}
namespace MvPolynomial
variable {σ τ : Type*} {r : R} {e : ℕ} {n m : σ} {s : σ →₀ ℕ}
section CommSemiring
variable [CommSemiring R] {p q : MvPolynomial σ R}
section Vars
/-! ### `vars` -/
/-- `vars p` is the set of variables appearing in the polynomial `p` -/
def vars (p : MvPolynomial σ R) : Finset σ :=
letI := Classical.decEq σ
p.degrees.toFinset
theorem vars_def [DecidableEq σ] (p : MvPolynomial σ R) : p.vars = p.degrees.toFinset := by
rw [vars]
convert rfl
@[simp]
theorem vars_0 : (0 : MvPolynomial σ R).vars = ∅ := by
classical rw [vars_def, degrees_zero, Multiset.toFinset_zero]
@[simp]
theorem vars_monomial (h : r ≠ 0) : (monomial s r).vars = s.support := by
classical rw [vars_def, degrees_monomial_eq _ _ h, Finsupp.toFinset_toMultiset]
@[simp]
theorem vars_C : (C r : MvPolynomial σ R).vars = ∅ := by
classical rw [vars_def, degrees_C, Multiset.toFinset_zero]
@[simp]
theorem vars_X [Nontrivial R] : (X n : MvPolynomial σ R).vars = {n} := by
rw [X, vars_monomial (one_ne_zero' R), Finsupp.support_single_ne_zero _ (one_ne_zero' ℕ)]
theorem mem_vars (i : σ) : i ∈ p.vars ↔ ∃ d ∈ p.support, i ∈ d.support := by
classical simp only [vars_def, Multiset.mem_toFinset, mem_degrees, mem_support_iff, exists_prop]
theorem mem_support_not_mem_vars_zero {f : MvPolynomial σ R} {x : σ →₀ ℕ} (H : x ∈ f.support)
{v : σ} (h : v ∉ vars f) : x v = 0 := by
contrapose! h
exact (mem_vars v).mpr ⟨x, H, Finsupp.mem_support_iff.mpr h⟩
theorem vars_add_subset [DecidableEq σ] (p q : MvPolynomial σ R) :
(p + q).vars ⊆ p.vars ∪ q.vars := by
intro x hx
simp only [vars_def, Finset.mem_union, Multiset.mem_toFinset] at hx ⊢
simpa using Multiset.mem_of_le degrees_add_le hx
theorem vars_add_of_disjoint [DecidableEq σ] (h : Disjoint p.vars q.vars) :
(p + q).vars = p.vars ∪ q.vars := by
refine (vars_add_subset p q).antisymm fun x hx => ?_
simp only [vars_def, Multiset.disjoint_toFinset] at h hx ⊢
rwa [degrees_add_of_disjoint h, Multiset.toFinset_union]
section Mul
theorem vars_mul [DecidableEq σ] (φ ψ : MvPolynomial σ R) : (φ * ψ).vars ⊆ φ.vars ∪ ψ.vars := by
simp_rw [vars_def, ← Multiset.toFinset_add, Multiset.toFinset_subset]
exact Multiset.subset_of_le degrees_mul_le
@[simp]
theorem vars_one : (1 : MvPolynomial σ R).vars = ∅ :=
vars_C
theorem vars_pow (φ : MvPolynomial σ R) (n : ℕ) : (φ ^ n).vars ⊆ φ.vars := by
classical
induction n with
| zero => simp
| succ n ih =>
rw [pow_succ']
apply Finset.Subset.trans (vars_mul _ _)
exact Finset.union_subset (Finset.Subset.refl _) ih
/-- The variables of the product of a family of polynomials
are a subset of the union of the sets of variables of each polynomial.
-/
theorem vars_prod {ι : Type*} [DecidableEq σ] {s : Finset ι} (f : ι → MvPolynomial σ R) :
(∏ i ∈ s, f i).vars ⊆ s.biUnion fun i => (f i).vars := by
classical
induction s using Finset.induction_on with
| empty => simp
| insert _ _ hs hsub =>
simp only [hs, Finset.biUnion_insert, Finset.prod_insert, not_false_iff]
apply Finset.Subset.trans (vars_mul _ _)
exact Finset.union_subset_union (Finset.Subset.refl _) hsub
section IsDomain
variable {A : Type*} [CommRing A] [NoZeroDivisors A]
theorem vars_C_mul (a : A) (ha : a ≠ 0) (φ : MvPolynomial σ A) :
(C a * φ : MvPolynomial σ A).vars = φ.vars := by
ext1 i
simp only [mem_vars, exists_prop, mem_support_iff]
apply exists_congr
intro d
apply and_congr _ Iff.rfl
rw [coeff_C_mul, mul_ne_zero_iff, eq_true ha, true_and]
end IsDomain
end Mul
section Sum
variable {ι : Type*} (t : Finset ι) (φ : ι → MvPolynomial σ R)
theorem vars_sum_subset [DecidableEq σ] :
(∑ i ∈ t, φ i).vars ⊆ Finset.biUnion t fun i => (φ i).vars := by
classical
induction t using Finset.induction_on with
| empty => simp
| insert _ _ has hsum =>
rw [Finset.biUnion_insert, Finset.sum_insert has]
refine Finset.Subset.trans
(vars_add_subset _ _) (Finset.union_subset_union (Finset.Subset.refl _) ?_)
assumption
theorem vars_sum_of_disjoint [DecidableEq σ] (h : Pairwise <| (Disjoint on fun i => (φ i).vars)) :
(∑ i ∈ t, φ i).vars = Finset.biUnion t fun i => (φ i).vars := by
classical
induction t using Finset.induction_on with
| empty => simp
| insert _ _ has hsum =>
rw [Finset.biUnion_insert, Finset.sum_insert has, vars_add_of_disjoint, hsum]
unfold Pairwise onFun at h
rw [hsum]
simp only [Finset.disjoint_iff_ne] at h ⊢
intro v hv v2 hv2
rw [Finset.mem_biUnion] at hv2
rcases hv2 with ⟨i, his, hi⟩
refine h ?_ _ hv _ hi
rintro rfl
contradiction
end Sum
section Map
variable [CommSemiring S] (f : R →+* S)
variable (p)
theorem vars_map : (map f p).vars ⊆ p.vars := by
classical simp [vars_def, Multiset.subset_of_le degrees_map_le]
variable {f}
theorem vars_map_of_injective (hf : Injective f) : (map f p).vars = p.vars := by
simp [vars, degrees_map_of_injective _ hf]
theorem vars_monomial_single (i : σ) {e : ℕ} {r : R} (he : e ≠ 0) (hr : r ≠ 0) :
(monomial (Finsupp.single i e) r).vars = {i} := by
rw [vars_monomial hr, Finsupp.support_single_ne_zero _ he]
theorem vars_eq_support_biUnion_support [DecidableEq σ] :
p.vars = p.support.biUnion Finsupp.support := by
ext i
rw [mem_vars, Finset.mem_biUnion]
end Map
end Vars
| Mathlib/Algebra/MvPolynomial/Variables.lean | 217 | 217 | |
/-
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 | 1,179 | 1,183 | |
/-
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.Topology.MetricSpace.HausdorffDistance
/-!
# Thickenings in pseudo-metric spaces
## Main definitions
* `Metric.thickening δ s`, the open thickening by radius `δ` of a set `s` in a pseudo emetric space.
* `Metric.cthickening δ s`, the closed thickening by radius `δ` of a set `s` in a pseudo emetric
space.
## Main results
* `Disjoint.exists_thickenings`: two disjoint sets admit disjoint thickenings
* `Disjoint.exists_cthickenings`: two disjoint sets admit disjoint closed thickenings
* `IsCompact.exists_cthickening_subset_open`: if `s` is compact, `t` is open and `s ⊆ t`,
some `cthickening` of `s` is contained in `t`.
* `Metric.hasBasis_nhdsSet_cthickening`: the `cthickening`s of a compact set `K` form a basis
of the neighbourhoods of `K`
* `Metric.closure_eq_iInter_cthickening'`: the closure of a set equals the intersection
of its closed thickenings of positive radii accumulating at zero.
The same holds for open thickenings.
* `IsCompact.cthickening_eq_biUnion_closedBall`: if `s` is compact, `cthickening δ s` is the union
of `closedBall`s of radius `δ` around `x : E`.
-/
noncomputable section
open NNReal ENNReal Topology Set Filter Bornology
universe u v w
variable {ι : Sort*} {α : Type u}
namespace Metric
section Thickening
variable [PseudoEMetricSpace α] {δ : ℝ} {s : Set α} {x : α}
open EMetric
/-- The (open) `δ`-thickening `Metric.thickening δ E` of a subset `E` in a pseudo emetric space
consists of those points that are at distance less than `δ` from some point of `E`. -/
def thickening (δ : ℝ) (E : Set α) : Set α :=
{ x : α | infEdist x E < ENNReal.ofReal δ }
theorem mem_thickening_iff_infEdist_lt : x ∈ thickening δ s ↔ infEdist x s < ENNReal.ofReal δ :=
Iff.rfl
/-- An exterior point of a subset `E` (i.e., a point outside the closure of `E`) is not in the
(open) `δ`-thickening of `E` for small enough positive `δ`. -/
lemma eventually_not_mem_thickening_of_infEdist_pos {E : Set α} {x : α} (h : x ∉ closure E) :
∀ᶠ δ in 𝓝 (0 : ℝ), x ∉ Metric.thickening δ E := by
obtain ⟨ε, ⟨ε_pos, ε_lt⟩⟩ := exists_real_pos_lt_infEdist_of_not_mem_closure h
filter_upwards [eventually_lt_nhds ε_pos] with δ hδ
simp only [thickening, mem_setOf_eq, not_lt]
exact (ENNReal.ofReal_le_ofReal hδ.le).trans ε_lt.le
/-- The (open) thickening equals the preimage of an open interval under `EMetric.infEdist`. -/
theorem thickening_eq_preimage_infEdist (δ : ℝ) (E : Set α) :
thickening δ E = (infEdist · E) ⁻¹' Iio (ENNReal.ofReal δ) :=
rfl
/-- The (open) thickening is an open set. -/
theorem isOpen_thickening {δ : ℝ} {E : Set α} : IsOpen (thickening δ E) :=
Continuous.isOpen_preimage continuous_infEdist _ isOpen_Iio
/-- The (open) thickening of the empty set is empty. -/
@[simp]
theorem thickening_empty (δ : ℝ) : thickening δ (∅ : Set α) = ∅ := by
simp only [thickening, setOf_false, infEdist_empty, not_top_lt]
theorem thickening_of_nonpos (hδ : δ ≤ 0) (s : Set α) : thickening δ s = ∅ :=
eq_empty_of_forall_not_mem fun _ => ((ENNReal.ofReal_of_nonpos hδ).trans_le bot_le).not_lt
/-- The (open) thickening `Metric.thickening δ E` of a fixed subset `E` is an increasing function of
the thickening radius `δ`. -/
@[gcongr]
theorem thickening_mono {δ₁ δ₂ : ℝ} (hle : δ₁ ≤ δ₂) (E : Set α) :
thickening δ₁ E ⊆ thickening δ₂ E :=
preimage_mono (Iio_subset_Iio (ENNReal.ofReal_le_ofReal hle))
/-- The (open) thickening `Metric.thickening δ E` with a fixed thickening radius `δ` is
an increasing function of the subset `E`. -/
theorem thickening_subset_of_subset (δ : ℝ) {E₁ E₂ : Set α} (h : E₁ ⊆ E₂) :
thickening δ E₁ ⊆ thickening δ E₂ := fun _ hx => lt_of_le_of_lt (infEdist_anti h) hx
theorem mem_thickening_iff_exists_edist_lt {δ : ℝ} (E : Set α) (x : α) :
x ∈ thickening δ E ↔ ∃ z ∈ E, edist x z < ENNReal.ofReal δ :=
infEdist_lt_iff
/-- The frontier of the (open) thickening of a set is contained in an `EMetric.infEdist` level
set. -/
theorem frontier_thickening_subset (E : Set α) {δ : ℝ} :
frontier (thickening δ E) ⊆ { x : α | infEdist x E = ENNReal.ofReal δ } :=
frontier_lt_subset_eq continuous_infEdist continuous_const
open scoped Function in -- required for scoped `on` notation
theorem frontier_thickening_disjoint (A : Set α) :
Pairwise (Disjoint on fun r : ℝ => frontier (thickening r A)) := by
refine (pairwise_disjoint_on _).2 fun r₁ r₂ hr => ?_
rcases le_total r₁ 0 with h₁ | h₁
· simp [thickening_of_nonpos h₁]
refine ((disjoint_singleton.2 fun h => hr.ne ?_).preimage _).mono (frontier_thickening_subset _)
(frontier_thickening_subset _)
apply_fun ENNReal.toReal at h
rwa [ENNReal.toReal_ofReal h₁, ENNReal.toReal_ofReal (h₁.trans hr.le)] at h
/-- Any set is contained in the complement of the δ-thickening of the complement of its
δ-thickening. -/
lemma subset_compl_thickening_compl_thickening_self (δ : ℝ) (E : Set α) :
E ⊆ (thickening δ (thickening δ E)ᶜ)ᶜ := by
intro x x_in_E
simp only [thickening, mem_compl_iff, mem_setOf_eq, not_lt]
apply EMetric.le_infEdist.mpr fun y hy ↦ ?_
simp only [mem_compl_iff, mem_setOf_eq, not_lt] at hy
simpa only [edist_comm] using le_trans hy <| EMetric.infEdist_le_edist_of_mem x_in_E
/-- The δ-thickening of the complement of the δ-thickening of a set is contained in the complement
| of the set. -/
lemma thickening_compl_thickening_self_subset_compl (δ : ℝ) (E : Set α) :
thickening δ (thickening δ E)ᶜ ⊆ Eᶜ := by
apply compl_subset_compl.mp
simpa only [compl_compl] using subset_compl_thickening_compl_thickening_self δ E
variable {X : Type u} [PseudoMetricSpace X]
theorem mem_thickening_iff_infDist_lt {E : Set X} {x : X} (h : E.Nonempty) :
| Mathlib/Topology/MetricSpace/Thickening.lean | 125 | 133 |
/-
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)
| Mathlib/Algebra/GeomSum.lean | 247 | 248 |
/-
Copyright (c) 2022 Kalle Kytölä. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Kalle Kytölä
-/
import Mathlib.Data.ENNReal.Lemmas
import Mathlib.Topology.MetricSpace.Thickening
import Mathlib.Topology.ContinuousMap.Bounded.Basic
/-!
# Thickened indicators
This file is about thickened indicators of sets in (pseudo e)metric spaces. For a decreasing
sequence of thickening radii tending to 0, the thickened indicators of a closed set form a
decreasing pointwise converging approximation of the indicator function of the set, where the
members of the approximating sequence are nonnegative bounded continuous functions.
## Main definitions
* `thickenedIndicatorAux δ E`: The `δ`-thickened indicator of a set `E` as an
unbundled `ℝ≥0∞`-valued function.
* `thickenedIndicator δ E`: The `δ`-thickened indicator of a set `E` as a bundled
bounded continuous `ℝ≥0`-valued function.
## Main results
* For a sequence of thickening radii tending to 0, the `δ`-thickened indicators of a set `E` tend
pointwise to the indicator of `closure E`.
- `thickenedIndicatorAux_tendsto_indicator_closure`: The version is for the
unbundled `ℝ≥0∞`-valued functions.
- `thickenedIndicator_tendsto_indicator_closure`: The version is for the bundled `ℝ≥0`-valued
bounded continuous functions.
-/
open NNReal ENNReal Topology BoundedContinuousFunction Set Metric EMetric Filter
noncomputable section thickenedIndicator
variable {α : Type*} [PseudoEMetricSpace α]
/-- The `δ`-thickened indicator of a set `E` is the function that equals `1` on `E`
and `0` outside a `δ`-thickening of `E` and interpolates (continuously) between
these values using `infEdist _ E`.
`thickenedIndicatorAux` is the unbundled `ℝ≥0∞`-valued function. See `thickenedIndicator`
for the (bundled) bounded continuous function with `ℝ≥0`-values. -/
def thickenedIndicatorAux (δ : ℝ) (E : Set α) : α → ℝ≥0∞ :=
fun x : α => (1 : ℝ≥0∞) - infEdist x E / ENNReal.ofReal δ
theorem continuous_thickenedIndicatorAux {δ : ℝ} (δ_pos : 0 < δ) (E : Set α) :
Continuous (thickenedIndicatorAux δ E) := by
unfold thickenedIndicatorAux
let f := fun x : α => (⟨1, infEdist x E / ENNReal.ofReal δ⟩ : ℝ≥0 × ℝ≥0∞)
let sub := fun p : ℝ≥0 × ℝ≥0∞ => (p.1 : ℝ≥0∞) - p.2
rw [show (fun x : α => (1 : ℝ≥0∞) - infEdist x E / ENNReal.ofReal δ) = sub ∘ f by rfl]
apply (@ENNReal.continuous_nnreal_sub 1).comp
apply (ENNReal.continuous_div_const (ENNReal.ofReal δ) _).comp continuous_infEdist
norm_num [δ_pos]
theorem thickenedIndicatorAux_le_one (δ : ℝ) (E : Set α) (x : α) :
thickenedIndicatorAux δ E x ≤ 1 := by
apply tsub_le_self (α := ℝ≥0∞)
theorem thickenedIndicatorAux_lt_top {δ : ℝ} {E : Set α} {x : α} :
thickenedIndicatorAux δ E x < ∞ :=
lt_of_le_of_lt (thickenedIndicatorAux_le_one _ _ _) one_lt_top
| theorem thickenedIndicatorAux_closure_eq (δ : ℝ) (E : Set α) :
thickenedIndicatorAux δ (closure E) = thickenedIndicatorAux δ E := by
simp +unfoldPartialApp only [thickenedIndicatorAux, infEdist_closure]
| Mathlib/Topology/MetricSpace/ThickenedIndicator.lean | 69 | 71 |
/-
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 | 1,581 | 1,590 | |
/-
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.Combinatorics.Hall.Basic
import Mathlib.Data.Matrix.Rank
import Mathlib.LinearAlgebra.Projectivization.Constructions
/-!
# Configurations of Points and lines
This file introduces abstract configurations of points and lines, and proves some basic properties.
## Main definitions
* `Configuration.Nondegenerate`: Excludes certain degenerate configurations,
and imposes uniqueness of intersection points.
* `Configuration.HasPoints`: A nondegenerate configuration in which
every pair of lines has an intersection point.
* `Configuration.HasLines`: A nondegenerate configuration in which
every pair of points has a line through them.
* `Configuration.lineCount`: The number of lines through a given point.
* `Configuration.pointCount`: The number of lines through a given line.
## Main statements
* `Configuration.HasLines.card_le`: `HasLines` implies `|P| ≤ |L|`.
* `Configuration.HasPoints.card_le`: `HasPoints` implies `|L| ≤ |P|`.
* `Configuration.HasLines.hasPoints`: `HasLines` and `|P| = |L|` implies `HasPoints`.
* `Configuration.HasPoints.hasLines`: `HasPoints` and `|P| = |L|` implies `HasLines`.
Together, these four statements say that any two of the following properties imply the third:
(a) `HasLines`, (b) `HasPoints`, (c) `|P| = |L|`.
-/
open Finset
namespace Configuration
variable (P L : Type*) [Membership P L]
/-- A type synonym. -/
def Dual :=
P
instance [h : Inhabited P] : Inhabited (Dual P) :=
h
instance [Finite P] : Finite (Dual P) :=
‹Finite P›
instance [h : Fintype P] : Fintype (Dual P) :=
h
set_option synthInstance.checkSynthOrder false in
instance : Membership (Dual L) (Dual P) :=
⟨Function.swap (Membership.mem : L → P → Prop)⟩
/-- A configuration is nondegenerate if:
1) there does not exist a line that passes through all of the points,
2) there does not exist a point that is on all of the lines,
3) there is at most one line through any two points,
4) any two lines have at most one intersection point.
Conditions 3 and 4 are equivalent. -/
class Nondegenerate : Prop where
exists_point : ∀ l : L, ∃ p, p ∉ l
exists_line : ∀ p, ∃ l : L, p ∉ l
eq_or_eq : ∀ {p₁ p₂ : P} {l₁ l₂ : L}, p₁ ∈ l₁ → p₂ ∈ l₁ → p₁ ∈ l₂ → p₂ ∈ l₂ → p₁ = p₂ ∨ l₁ = l₂
/-- A nondegenerate configuration in which every pair of lines has an intersection point. -/
class HasPoints extends Nondegenerate P L where
/-- Intersection of two lines -/
mkPoint : ∀ {l₁ l₂ : L}, l₁ ≠ l₂ → P
mkPoint_ax : ∀ {l₁ l₂ : L} (h : l₁ ≠ l₂), mkPoint h ∈ l₁ ∧ mkPoint h ∈ l₂
/-- A nondegenerate configuration in which every pair of points has a line through them. -/
class HasLines extends Nondegenerate P L where
/-- Line through two points -/
mkLine : ∀ {p₁ p₂ : P}, p₁ ≠ p₂ → L
mkLine_ax : ∀ {p₁ p₂ : P} (h : p₁ ≠ p₂), p₁ ∈ mkLine h ∧ p₂ ∈ mkLine h
open Nondegenerate
open HasPoints (mkPoint mkPoint_ax)
open HasLines (mkLine mkLine_ax)
instance Dual.Nondegenerate [Nondegenerate P L] : Nondegenerate (Dual L) (Dual P) where
exists_point := @exists_line P L _ _
exists_line := @exists_point P L _ _
eq_or_eq := @fun l₁ l₂ p₁ p₂ h₁ h₂ h₃ h₄ => (@eq_or_eq P L _ _ p₁ p₂ l₁ l₂ h₁ h₃ h₂ h₄).symm
instance Dual.hasLines [HasPoints P L] : HasLines (Dual L) (Dual P) :=
{ Dual.Nondegenerate _ _ with
mkLine := @mkPoint P L _ _
mkLine_ax := @mkPoint_ax P L _ _ }
instance Dual.hasPoints [HasLines P L] : HasPoints (Dual L) (Dual P) :=
{ Dual.Nondegenerate _ _ with
mkPoint := @mkLine P L _ _
mkPoint_ax := @mkLine_ax P L _ _ }
theorem HasPoints.existsUnique_point [HasPoints P L] (l₁ l₂ : L) (hl : l₁ ≠ l₂) :
∃! p, p ∈ l₁ ∧ p ∈ l₂ :=
⟨mkPoint hl, mkPoint_ax hl, fun _ hp =>
(eq_or_eq hp.1 (mkPoint_ax hl).1 hp.2 (mkPoint_ax hl).2).resolve_right hl⟩
theorem HasLines.existsUnique_line [HasLines P L] (p₁ p₂ : P) (hp : p₁ ≠ p₂) :
∃! l : L, p₁ ∈ l ∧ p₂ ∈ l :=
HasPoints.existsUnique_point (Dual L) (Dual P) p₁ p₂ hp
variable {P L}
/-- If a nondegenerate configuration has at least as many points as lines, then there exists
an injective function `f` from lines to points, such that `f l` does not lie on `l`. -/
theorem Nondegenerate.exists_injective_of_card_le [Nondegenerate P L] [Fintype P] [Fintype L]
(h : Fintype.card L ≤ Fintype.card P) : ∃ f : L → P, Function.Injective f ∧ ∀ l, f l ∉ l := by
classical
let t : L → Finset P := fun l => Set.toFinset { p | p ∉ l }
suffices ∀ s : Finset L, #s ≤ (s.biUnion t).card by
-- Hall's marriage theorem
obtain ⟨f, hf1, hf2⟩ := (Finset.all_card_le_biUnion_card_iff_exists_injective t).mp this
exact ⟨f, hf1, fun l => Set.mem_toFinset.mp (hf2 l)⟩
intro s
by_cases hs₀ : #s = 0
-- If `s = ∅`, then `#s = 0 ≤ #(s.bUnion t)`
· simp_rw [hs₀, zero_le]
by_cases hs₁ : #s = 1
-- If `s = {l}`, then pick a point `p ∉ l`
· obtain ⟨l, rfl⟩ := Finset.card_eq_one.mp hs₁
obtain ⟨p, hl⟩ := exists_point (P := P) l
rw [Finset.card_singleton, Finset.singleton_biUnion, Nat.one_le_iff_ne_zero]
exact Finset.card_ne_zero_of_mem (Set.mem_toFinset.mpr hl)
suffices #(s.biUnion t)ᶜ ≤ #sᶜ by
-- Rephrase in terms of complements (uses `h`)
rw [Finset.card_compl, Finset.card_compl, tsub_le_iff_left] at this
replace := h.trans this
rwa [← add_tsub_assoc_of_le s.card_le_univ, le_tsub_iff_left (le_add_left s.card_le_univ),
add_le_add_iff_right] at this
have hs₂ : #(s.biUnion t)ᶜ ≤ 1 := by
-- At most one line through two points of `s`
refine Finset.card_le_one_iff.mpr @fun p₁ p₂ hp₁ hp₂ => ?_
simp_rw [t, Finset.mem_compl, Finset.mem_biUnion, not_exists, not_and,
Set.mem_toFinset, Set.mem_setOf_eq, Classical.not_not] at hp₁ hp₂
obtain ⟨l₁, l₂, hl₁, hl₂, hl₃⟩ :=
Finset.one_lt_card_iff.mp (Nat.one_lt_iff_ne_zero_and_ne_one.mpr ⟨hs₀, hs₁⟩)
exact (eq_or_eq (hp₁ l₁ hl₁) (hp₂ l₁ hl₁) (hp₁ l₂ hl₂) (hp₂ l₂ hl₂)).resolve_right hl₃
by_cases hs₃ : #sᶜ = 0
· rw [hs₃, Nat.le_zero]
rw [Finset.card_compl, tsub_eq_zero_iff_le, LE.le.le_iff_eq (Finset.card_le_univ _), eq_comm,
Finset.card_eq_iff_eq_univ] at hs₃ ⊢
rw [hs₃]
rw [Finset.eq_univ_iff_forall] at hs₃ ⊢
exact fun p =>
Exists.elim (exists_line p)-- If `s = univ`, then show `s.bUnion t = univ`
fun l hl => Finset.mem_biUnion.mpr ⟨l, Finset.mem_univ l, Set.mem_toFinset.mpr hl⟩
· exact hs₂.trans (Nat.one_le_iff_ne_zero.mpr hs₃)
-- If `s < univ`, then consequence of `hs₂`
variable (L)
/-- Number of points on a given line. -/
noncomputable def lineCount (p : P) : ℕ :=
Nat.card { l : L // p ∈ l }
variable (P) {L}
/-- Number of lines through a given point. -/
noncomputable def pointCount (l : L) : ℕ :=
Nat.card { p : P // p ∈ l }
variable (L)
theorem sum_lineCount_eq_sum_pointCount [Fintype P] [Fintype L] :
∑ p : P, lineCount L p = ∑ l : L, pointCount P l := by
classical
simp only [lineCount, pointCount, Nat.card_eq_fintype_card, ← Fintype.card_sigma]
apply Fintype.card_congr
calc
(Σp, { l : L // p ∈ l }) ≃ { x : P × L // x.1 ∈ x.2 } :=
(Equiv.subtypeProdEquivSigmaSubtype (· ∈ ·)).symm
_ ≃ { x : L × P // x.2 ∈ x.1 } := (Equiv.prodComm P L).subtypeEquiv fun x => Iff.rfl
_ ≃ Σl, { p // p ∈ l } := Equiv.subtypeProdEquivSigmaSubtype fun (l : L) (p : P) => p ∈ l
variable {P L}
theorem HasLines.pointCount_le_lineCount [HasLines P L] {p : P} {l : L} (h : p ∉ l)
[Finite { l : L // p ∈ l }] : pointCount P l ≤ lineCount L p := by
by_cases hf : Infinite { p : P // p ∈ l }
· exact (le_of_eq Nat.card_eq_zero_of_infinite).trans (zero_le (lineCount L p))
haveI := fintypeOfNotInfinite hf
cases nonempty_fintype { l : L // p ∈ l }
rw [lineCount, pointCount, Nat.card_eq_fintype_card, Nat.card_eq_fintype_card]
have : ∀ p' : { p // p ∈ l }, p ≠ p' := fun p' hp' => h ((congr_arg (· ∈ l) hp').mpr p'.2)
exact
Fintype.card_le_of_injective (fun p' => ⟨mkLine (this p'), (mkLine_ax (this p')).1⟩)
fun p₁ p₂ hp =>
Subtype.ext ((eq_or_eq p₁.2 p₂.2 (mkLine_ax (this p₁)).2
((congr_arg (_ ∈ ·) (Subtype.ext_iff.mp hp)).mpr (mkLine_ax (this p₂)).2)).resolve_right
fun h' => (congr_arg (¬p ∈ ·) h').mp h (mkLine_ax (this p₁)).1)
theorem HasPoints.lineCount_le_pointCount [HasPoints P L] {p : P} {l : L} (h : p ∉ l)
[hf : Finite { p : P // p ∈ l }] : lineCount L p ≤ pointCount P l :=
@HasLines.pointCount_le_lineCount (Dual L) (Dual P) _ _ l p h hf
variable (P L)
/-- If a nondegenerate configuration has a unique line through any two points, then `|P| ≤ |L|`. -/
theorem HasLines.card_le [HasLines P L] [Fintype P] [Fintype L] :
Fintype.card P ≤ Fintype.card L := by
classical
by_contra hc₂
obtain ⟨f, hf₁, hf₂⟩ := Nondegenerate.exists_injective_of_card_le (le_of_not_le hc₂)
have :=
calc
∑ p, lineCount L p = ∑ l, pointCount P l := sum_lineCount_eq_sum_pointCount P L
_ ≤ ∑ l, lineCount L (f l) :=
(Finset.sum_le_sum fun l _ => HasLines.pointCount_le_lineCount (hf₂ l))
_ = ∑ p ∈ univ.map ⟨f, hf₁⟩, lineCount L p := by rw [sum_map]; dsimp
_ < ∑ p, lineCount L p := by
obtain ⟨p, hp⟩ := not_forall.mp (mt (Fintype.card_le_of_surjective f) hc₂)
refine sum_lt_sum_of_subset (subset_univ _) (mem_univ p) ?_ ?_ fun p _ _ ↦ zero_le _
· simpa only [Finset.mem_map, exists_prop, Finset.mem_univ, true_and]
· rw [lineCount, Nat.card_eq_fintype_card, Fintype.card_pos_iff]
obtain ⟨l, _⟩ := @exists_line P L _ _ p
exact
let this := not_exists.mp hp l
⟨⟨mkLine this, (mkLine_ax this).2⟩⟩
exact lt_irrefl _ this
/-- If a nondegenerate configuration has a unique point on any two lines, then `|L| ≤ |P|`. -/
theorem HasPoints.card_le [HasPoints P L] [Fintype P] [Fintype L] :
Fintype.card L ≤ Fintype.card P :=
@HasLines.card_le (Dual L) (Dual P) _ _ _ _
variable {P L}
theorem HasLines.exists_bijective_of_card_eq [HasLines P L] [Fintype P] [Fintype L]
(h : Fintype.card P = Fintype.card L) :
∃ f : L → P, Function.Bijective f ∧ ∀ l, pointCount P l = lineCount L (f l) := by
classical
obtain ⟨f, hf1, hf2⟩ := Nondegenerate.exists_injective_of_card_le (ge_of_eq h)
have hf3 := (Fintype.bijective_iff_injective_and_card f).mpr ⟨hf1, h.symm⟩
exact ⟨f, hf3, fun l ↦ (sum_eq_sum_iff_of_le fun l _ ↦ pointCount_le_lineCount (hf2 l)).1
((hf3.sum_comp _).trans (sum_lineCount_eq_sum_pointCount P L)).symm _ <| mem_univ _⟩
theorem HasLines.lineCount_eq_pointCount [HasLines P L] [Fintype P] [Fintype L]
(hPL : Fintype.card P = Fintype.card L) {p : P} {l : L} (hpl : p ∉ l) :
lineCount L p = pointCount P l := by
classical
obtain ⟨f, hf1, hf2⟩ := HasLines.exists_bijective_of_card_eq hPL
let s : Finset (P × L) := Set.toFinset { i | i.1 ∈ i.2 }
have step1 : ∑ i : P × L, lineCount L i.1 = ∑ i : P × L, pointCount P i.2 := by
rw [← Finset.univ_product_univ, Finset.sum_product_right, Finset.sum_product]
simp_rw [Finset.sum_const, Finset.card_univ, hPL, sum_lineCount_eq_sum_pointCount]
have step2 : ∑ i ∈ s, lineCount L i.1 = ∑ i ∈ s, pointCount P i.2 := by
| rw [s.sum_finset_product Finset.univ fun p => Set.toFinset { l | p ∈ l }]
on_goal 1 =>
rw [s.sum_finset_product_right Finset.univ fun l => Set.toFinset { p | p ∈ l }, eq_comm]
· refine sum_bijective _ hf1 (by simp) fun l _ ↦ ?_
simp_rw [hf2, sum_const, Set.toFinset_card, ← Nat.card_eq_fintype_card]
change pointCount P l • _ = lineCount L (f l) • _
rw [hf2]
all_goals simp_rw [s, Finset.mem_univ, true_and, Set.mem_toFinset]; exact fun p => Iff.rfl
| Mathlib/Combinatorics/Configuration.lean | 256 | 263 |
/-
Copyright (c) 2014 Microsoft Corporation. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Mario Carneiro
-/
import Mathlib.Algebra.Order.Ring.Nat
import Mathlib.Algebra.Ring.Int.Defs
import Mathlib.Data.Nat.Bitwise
import Mathlib.Data.Nat.Cast.Order.Basic
import Mathlib.Data.Nat.PSub
import Mathlib.Data.Nat.Size
import Mathlib.Data.Num.Bitwise
/-!
# Properties of the binary representation of integers
-/
open Int
attribute [local simp] add_assoc
namespace PosNum
variable {α : Type*}
@[simp, norm_cast]
theorem cast_one [One α] [Add α] : ((1 : PosNum) : α) = 1 :=
rfl
@[simp]
theorem cast_one' [One α] [Add α] : (PosNum.one : α) = 1 :=
rfl
@[simp, norm_cast]
theorem cast_bit0 [One α] [Add α] (n : PosNum) : (n.bit0 : α) = (n : α) + n :=
rfl
@[simp, norm_cast]
theorem cast_bit1 [One α] [Add α] (n : PosNum) : (n.bit1 : α) = ((n : α) + n) + 1 :=
rfl
@[simp, norm_cast]
theorem cast_to_nat [AddMonoidWithOne α] : ∀ n : PosNum, ((n : ℕ) : α) = n
| 1 => Nat.cast_one
| bit0 p => by dsimp; rw [Nat.cast_add, p.cast_to_nat]
| bit1 p => by dsimp; rw [Nat.cast_add, Nat.cast_add, Nat.cast_one, p.cast_to_nat]
@[norm_cast]
theorem to_nat_to_int (n : PosNum) : ((n : ℕ) : ℤ) = n :=
cast_to_nat _
@[simp, norm_cast]
theorem cast_to_int [AddGroupWithOne α] (n : PosNum) : ((n : ℤ) : α) = n := by
rw [← to_nat_to_int, Int.cast_natCast, cast_to_nat]
theorem succ_to_nat : ∀ n, (succ n : ℕ) = n + 1
| 1 => rfl
| bit0 _ => rfl
| bit1 p =>
(congr_arg (fun n ↦ n + n) (succ_to_nat p)).trans <|
show ↑p + 1 + ↑p + 1 = ↑p + ↑p + 1 + 1 by simp [add_left_comm]
theorem one_add (n : PosNum) : 1 + n = succ n := by cases n <;> rfl
theorem add_one (n : PosNum) : n + 1 = succ n := by cases n <;> rfl
@[norm_cast]
theorem add_to_nat : ∀ m n, ((m + n : PosNum) : ℕ) = m + n
| 1, b => by rw [one_add b, succ_to_nat, add_comm, cast_one]
| a, 1 => by rw [add_one a, succ_to_nat, cast_one]
| bit0 a, bit0 b => (congr_arg (fun n ↦ n + n) (add_to_nat a b)).trans <| add_add_add_comm _ _ _ _
| bit0 a, bit1 b =>
(congr_arg (fun n ↦ (n + n) + 1) (add_to_nat a b)).trans <|
show (a + b + (a + b) + 1 : ℕ) = a + a + (b + b + 1) by simp [add_left_comm]
| bit1 a, bit0 b =>
(congr_arg (fun n ↦ (n + n) + 1) (add_to_nat a b)).trans <|
show (a + b + (a + b) + 1 : ℕ) = a + a + 1 + (b + b) by simp [add_comm, add_left_comm]
| bit1 a, bit1 b =>
show (succ (a + b) + succ (a + b) : ℕ) = a + a + 1 + (b + b + 1) by
rw [succ_to_nat, add_to_nat a b]; simp [add_left_comm]
theorem add_succ : ∀ m n : PosNum, m + succ n = succ (m + n)
| 1, b => by simp [one_add]
| bit0 a, 1 => congr_arg bit0 (add_one a)
| bit1 a, 1 => congr_arg bit1 (add_one a)
| bit0 _, bit0 _ => rfl
| bit0 a, bit1 b => congr_arg bit0 (add_succ a b)
| bit1 _, bit0 _ => rfl
| bit1 a, bit1 b => congr_arg bit1 (add_succ a b)
theorem bit0_of_bit0 : ∀ n, n + n = bit0 n
| 1 => rfl
| bit0 p => congr_arg bit0 (bit0_of_bit0 p)
| bit1 p => show bit0 (succ (p + p)) = _ by rw [bit0_of_bit0 p, succ]
theorem bit1_of_bit1 (n : PosNum) : (n + n) + 1 = bit1 n :=
show (n + n) + 1 = bit1 n by rw [add_one, bit0_of_bit0, succ]
@[norm_cast]
theorem mul_to_nat (m) : ∀ n, ((m * n : PosNum) : ℕ) = m * n
| 1 => (mul_one _).symm
| bit0 p => show (↑(m * p) + ↑(m * p) : ℕ) = ↑m * (p + p) by rw [mul_to_nat m p, left_distrib]
| bit1 p =>
(add_to_nat (bit0 (m * p)) m).trans <|
show (↑(m * p) + ↑(m * p) + ↑m : ℕ) = ↑m * (p + p) + m by rw [mul_to_nat m p, left_distrib]
theorem to_nat_pos : ∀ n : PosNum, 0 < (n : ℕ)
| 1 => Nat.zero_lt_one
| bit0 p =>
let h := to_nat_pos p
add_pos h h
| bit1 _p => Nat.succ_pos _
theorem cmp_to_nat_lemma {m n : PosNum} : (m : ℕ) < n → (bit1 m : ℕ) < bit0 n :=
show (m : ℕ) < n → (m + m + 1 + 1 : ℕ) ≤ n + n by
intro h; rw [Nat.add_right_comm m m 1, add_assoc]; exact Nat.add_le_add h h
theorem cmp_swap (m) : ∀ n, (cmp m n).swap = cmp n m := by
induction' m with m IH m IH <;> intro n <;> obtain - | n | n := n <;> unfold cmp <;>
try { rfl } <;> rw [← IH] <;> cases cmp m n <;> rfl
theorem cmp_to_nat : ∀ m n, (Ordering.casesOn (cmp m n) ((m : ℕ) < n) (m = n) ((n : ℕ) < m) : Prop)
| 1, 1 => rfl
| bit0 a, 1 =>
let h : (1 : ℕ) ≤ a := to_nat_pos a
Nat.add_le_add h h
| bit1 a, 1 => Nat.succ_lt_succ <| to_nat_pos <| bit0 a
| 1, bit0 b =>
let h : (1 : ℕ) ≤ b := to_nat_pos b
Nat.add_le_add h h
| 1, bit1 b => Nat.succ_lt_succ <| to_nat_pos <| bit0 b
| bit0 a, bit0 b => by
dsimp [cmp]
have := cmp_to_nat a b; revert this; cases cmp a b <;> dsimp <;> intro this
· exact Nat.add_lt_add this this
· rw [this]
· exact Nat.add_lt_add this this
| bit0 a, bit1 b => by
dsimp [cmp]
have := cmp_to_nat a b; revert this; cases cmp a b <;> dsimp <;> intro this
· exact Nat.le_succ_of_le (Nat.add_lt_add this this)
· rw [this]
apply Nat.lt_succ_self
· exact cmp_to_nat_lemma this
| bit1 a, bit0 b => by
dsimp [cmp]
have := cmp_to_nat a b; revert this; cases cmp a b <;> dsimp <;> intro this
· exact cmp_to_nat_lemma this
· rw [this]
apply Nat.lt_succ_self
· exact Nat.le_succ_of_le (Nat.add_lt_add this this)
| bit1 a, bit1 b => by
dsimp [cmp]
have := cmp_to_nat a b; revert this; cases cmp a b <;> dsimp <;> intro this
· exact Nat.succ_lt_succ (Nat.add_lt_add this this)
· rw [this]
· exact Nat.succ_lt_succ (Nat.add_lt_add this this)
@[norm_cast]
theorem lt_to_nat {m n : PosNum} : (m : ℕ) < n ↔ m < n :=
show (m : ℕ) < n ↔ cmp m n = Ordering.lt from
match cmp m n, cmp_to_nat m n with
| Ordering.lt, h => by simp only at h; simp [h]
| Ordering.eq, h => by simp only at h; simp [h, lt_irrefl]
| Ordering.gt, h => by simp [not_lt_of_gt h]
@[norm_cast]
theorem le_to_nat {m n : PosNum} : (m : ℕ) ≤ n ↔ m ≤ n := by
rw [← not_lt]; exact not_congr lt_to_nat
end PosNum
namespace Num
variable {α : Type*}
open PosNum
theorem add_zero (n : Num) : n + 0 = n := by cases n <;> rfl
theorem zero_add (n : Num) : 0 + n = n := by cases n <;> rfl
theorem add_one : ∀ n : Num, n + 1 = succ n
| 0 => rfl
| pos p => by cases p <;> rfl
theorem add_succ : ∀ m n : Num, m + succ n = succ (m + n)
| 0, n => by simp [zero_add]
| pos p, 0 => show pos (p + 1) = succ (pos p + 0) by rw [PosNum.add_one, add_zero, succ, succ']
| pos _, pos _ => congr_arg pos (PosNum.add_succ _ _)
theorem bit0_of_bit0 : ∀ n : Num, n + n = n.bit0
| 0 => rfl
| pos p => congr_arg pos p.bit0_of_bit0
theorem bit1_of_bit1 : ∀ n : Num, (n + n) + 1 = n.bit1
| 0 => rfl
| pos p => congr_arg pos p.bit1_of_bit1
@[simp]
theorem ofNat'_zero : Num.ofNat' 0 = 0 := by simp [Num.ofNat']
theorem ofNat'_bit (b n) : ofNat' (Nat.bit b n) = cond b Num.bit1 Num.bit0 (ofNat' n) :=
Nat.binaryRec_eq _ _ (.inl rfl)
@[simp]
theorem ofNat'_one : Num.ofNat' 1 = 1 := by erw [ofNat'_bit true 0, cond, ofNat'_zero]; rfl
theorem bit1_succ : ∀ n : Num, n.bit1.succ = n.succ.bit0
| 0 => rfl
| pos _n => rfl
theorem ofNat'_succ : ∀ {n}, ofNat' (n + 1) = ofNat' n + 1 :=
@(Nat.binaryRec (by simp [zero_add]) fun b n ih => by
cases b
· erw [ofNat'_bit true n, ofNat'_bit]
simp only [← bit1_of_bit1, ← bit0_of_bit0, cond]
· rw [show n.bit true + 1 = (n + 1).bit false by simp [Nat.bit, mul_add],
ofNat'_bit, ofNat'_bit, ih]
simp only [cond, add_one, bit1_succ])
@[simp]
theorem add_ofNat' (m n) : Num.ofNat' (m + n) = Num.ofNat' m + Num.ofNat' n := by
induction n
· simp only [Nat.add_zero, ofNat'_zero, add_zero]
· simp only [Nat.add_succ, Nat.add_zero, ofNat'_succ, add_one, add_succ, *]
@[simp, norm_cast]
theorem cast_zero [Zero α] [One α] [Add α] : ((0 : Num) : α) = 0 :=
rfl
@[simp]
theorem cast_zero' [Zero α] [One α] [Add α] : (Num.zero : α) = 0 :=
rfl
@[simp, norm_cast]
theorem cast_one [Zero α] [One α] [Add α] : ((1 : Num) : α) = 1 :=
rfl
@[simp]
theorem cast_pos [Zero α] [One α] [Add α] (n : PosNum) : (Num.pos n : α) = n :=
rfl
theorem succ'_to_nat : ∀ n, (succ' n : ℕ) = n + 1
| 0 => (Nat.zero_add _).symm
| pos _p => PosNum.succ_to_nat _
theorem succ_to_nat (n) : (succ n : ℕ) = n + 1 :=
succ'_to_nat n
@[simp, norm_cast]
theorem cast_to_nat [AddMonoidWithOne α] : ∀ n : Num, ((n : ℕ) : α) = n
| 0 => Nat.cast_zero
| pos p => p.cast_to_nat
@[norm_cast]
theorem add_to_nat : ∀ m n, ((m + n : Num) : ℕ) = m + n
| 0, 0 => rfl
| 0, pos _q => (Nat.zero_add _).symm
| pos _p, 0 => rfl
| pos _p, pos _q => PosNum.add_to_nat _ _
@[norm_cast]
theorem mul_to_nat : ∀ m n, ((m * n : Num) : ℕ) = m * n
| 0, 0 => rfl
| 0, pos _q => (zero_mul _).symm
| pos _p, 0 => rfl
| pos _p, pos _q => PosNum.mul_to_nat _ _
theorem cmp_to_nat : ∀ m n, (Ordering.casesOn (cmp m n) ((m : ℕ) < n) (m = n) ((n : ℕ) < m) : Prop)
| 0, 0 => rfl
| 0, pos _ => to_nat_pos _
| pos _, 0 => to_nat_pos _
| pos a, pos b => by
have := PosNum.cmp_to_nat a b; revert this; dsimp [cmp]; cases PosNum.cmp a b
exacts [id, congr_arg pos, id]
@[norm_cast]
theorem lt_to_nat {m n : Num} : (m : ℕ) < n ↔ m < n :=
show (m : ℕ) < n ↔ cmp m n = Ordering.lt from
match cmp m n, cmp_to_nat m n with
| Ordering.lt, h => by simp only at h; simp [h]
| Ordering.eq, h => by simp only at h; simp [h, lt_irrefl]
| Ordering.gt, h => by simp [not_lt_of_gt h]
@[norm_cast]
theorem le_to_nat {m n : Num} : (m : ℕ) ≤ n ↔ m ≤ n := by
rw [← not_lt]; exact not_congr lt_to_nat
end Num
namespace PosNum
@[simp]
theorem of_to_nat' : ∀ n : PosNum, Num.ofNat' (n : ℕ) = Num.pos n
| 1 => by erw [@Num.ofNat'_bit true 0, Num.ofNat'_zero]; rfl
| bit0 p => by
simpa only [Nat.bit_false, cond_false, two_mul, of_to_nat' p] using Num.ofNat'_bit false p
| bit1 p => by
simpa only [Nat.bit_true, cond_true, two_mul, of_to_nat' p] using Num.ofNat'_bit true p
end PosNum
namespace Num
@[simp, norm_cast]
theorem of_to_nat' : ∀ n : Num, Num.ofNat' (n : ℕ) = n
| 0 => ofNat'_zero
| pos p => p.of_to_nat'
lemma toNat_injective : Function.Injective (castNum : Num → ℕ) :=
Function.LeftInverse.injective of_to_nat'
@[norm_cast]
theorem to_nat_inj {m n : Num} : (m : ℕ) = n ↔ m = n := toNat_injective.eq_iff
/-- This tactic tries to turn an (in)equality about `Num`s to one about `Nat`s by rewriting.
```lean
example (n : Num) (m : Num) : n ≤ n + m := by
transfer_rw
exact Nat.le_add_right _ _
```
-/
scoped macro (name := transfer_rw) "transfer_rw" : tactic => `(tactic|
(repeat first | rw [← to_nat_inj] | rw [← lt_to_nat] | rw [← le_to_nat]
repeat first | rw [add_to_nat] | rw [mul_to_nat] | rw [cast_one] | rw [cast_zero]))
/--
This tactic tries to prove (in)equalities about `Num`s by transferring them to the `Nat` world and
then trying to call `simp`.
```lean
example (n : Num) (m : Num) : n ≤ n + m := by transfer
```
-/
scoped macro (name := transfer) "transfer" : tactic => `(tactic|
(intros; transfer_rw; try simp))
instance addMonoid : AddMonoid Num where
add := (· + ·)
zero := 0
zero_add := zero_add
add_zero := add_zero
add_assoc := by transfer
nsmul := nsmulRec
instance addMonoidWithOne : AddMonoidWithOne Num :=
{ Num.addMonoid with
natCast := Num.ofNat'
one := 1
natCast_zero := ofNat'_zero
natCast_succ := fun _ => ofNat'_succ }
instance commSemiring : CommSemiring Num where
__ := Num.addMonoid
__ := Num.addMonoidWithOne
mul := (· * ·)
npow := @npowRec Num ⟨1⟩ ⟨(· * ·)⟩
mul_zero _ := by rw [← to_nat_inj, mul_to_nat, cast_zero, mul_zero]
zero_mul _ := by rw [← to_nat_inj, mul_to_nat, cast_zero, zero_mul]
mul_one _ := by rw [← to_nat_inj, mul_to_nat, cast_one, mul_one]
one_mul _ := by rw [← to_nat_inj, mul_to_nat, cast_one, one_mul]
add_comm _ _ := by simp_rw [← to_nat_inj, add_to_nat, add_comm]
mul_comm _ _ := by simp_rw [← to_nat_inj, mul_to_nat, mul_comm]
mul_assoc _ _ _ := by simp_rw [← to_nat_inj, mul_to_nat, mul_assoc]
left_distrib _ _ _ := by simp only [← to_nat_inj, mul_to_nat, add_to_nat, mul_add]
right_distrib _ _ _ := by simp only [← to_nat_inj, mul_to_nat, add_to_nat, add_mul]
instance partialOrder : PartialOrder Num where
lt_iff_le_not_le a b := by simp only [← lt_to_nat, ← le_to_nat, lt_iff_le_not_le]
le_refl := by transfer
le_trans a b c := by transfer_rw; apply le_trans
le_antisymm a b := by transfer_rw; apply le_antisymm
instance isOrderedCancelAddMonoid : IsOrderedCancelAddMonoid Num where
add_le_add_left a b h c := by revert h; transfer_rw; exact fun h => add_le_add_left h c
le_of_add_le_add_left a b c :=
show a + b ≤ a + c → b ≤ c by transfer_rw; apply le_of_add_le_add_left
instance linearOrder : LinearOrder Num :=
{ le_total := by
intro a b
transfer_rw
apply le_total
toDecidableLT := Num.decidableLT
toDecidableLE := Num.decidableLE
-- This is relying on an automatically generated instance name,
-- generated in a `deriving` handler.
-- See https://github.com/leanprover/lean4/issues/2343
toDecidableEq := instDecidableEqNum }
instance isStrictOrderedRing : IsStrictOrderedRing Num :=
{ zero_le_one := by decide
mul_lt_mul_of_pos_left := by
intro a b c
transfer_rw
apply mul_lt_mul_of_pos_left
mul_lt_mul_of_pos_right := by
intro a b c
transfer_rw
apply mul_lt_mul_of_pos_right
exists_pair_ne := ⟨0, 1, by decide⟩ }
@[norm_cast]
theorem add_of_nat (m n) : ((m + n : ℕ) : Num) = m + n :=
add_ofNat' _ _
@[norm_cast]
theorem to_nat_to_int (n : Num) : ((n : ℕ) : ℤ) = n :=
cast_to_nat _
@[simp, norm_cast]
theorem cast_to_int {α} [AddGroupWithOne α] (n : Num) : ((n : ℤ) : α) = n := by
rw [← to_nat_to_int, Int.cast_natCast, cast_to_nat]
theorem to_of_nat : ∀ n : ℕ, ((n : Num) : ℕ) = n
| 0 => by rw [Nat.cast_zero, cast_zero]
| n + 1 => by rw [Nat.cast_succ, add_one, succ_to_nat, to_of_nat n]
@[simp, norm_cast]
theorem of_natCast {α} [AddMonoidWithOne α] (n : ℕ) : ((n : Num) : α) = n := by
rw [← cast_to_nat, to_of_nat]
@[norm_cast]
theorem of_nat_inj {m n : ℕ} : (m : Num) = n ↔ m = n :=
⟨fun h => Function.LeftInverse.injective to_of_nat h, congr_arg _⟩
-- The priority should be `high`er than `cast_to_nat`.
@[simp high, norm_cast]
theorem of_to_nat : ∀ n : Num, ((n : ℕ) : Num) = n :=
of_to_nat'
@[norm_cast]
theorem dvd_to_nat (m n : Num) : (m : ℕ) ∣ n ↔ m ∣ n :=
⟨fun ⟨k, e⟩ => ⟨k, by rw [← of_to_nat n, e]; simp⟩, fun ⟨k, e⟩ => ⟨k, by simp [e, mul_to_nat]⟩⟩
end Num
namespace PosNum
variable {α : Type*}
open Num
-- The priority should be `high`er than `cast_to_nat`.
@[simp high, norm_cast]
theorem of_to_nat : ∀ n : PosNum, ((n : ℕ) : Num) = Num.pos n :=
of_to_nat'
@[norm_cast]
theorem to_nat_inj {m n : PosNum} : (m : ℕ) = n ↔ m = n :=
⟨fun h => Num.pos.inj <| by rw [← PosNum.of_to_nat, ← PosNum.of_to_nat, h], congr_arg _⟩
theorem pred'_to_nat : ∀ n, (pred' n : ℕ) = Nat.pred n
| 1 => rfl
| bit0 n =>
have : Nat.succ ↑(pred' n) = ↑n := by
rw [pred'_to_nat n, Nat.succ_pred_eq_of_pos (to_nat_pos n)]
match (motive :=
∀ k : Num, Nat.succ ↑k = ↑n → ↑(Num.casesOn k 1 bit1 : PosNum) = Nat.pred (n + n))
pred' n, this with
| 0, (h : ((1 : Num) : ℕ) = n) => by rw [← to_nat_inj.1 h]; rfl
| Num.pos p, (h : Nat.succ ↑p = n) => by rw [← h]; exact (Nat.succ_add p p).symm
| bit1 _ => rfl
@[simp]
theorem pred'_succ' (n) : pred' (succ' n) = n :=
Num.to_nat_inj.1 <| by rw [pred'_to_nat, succ'_to_nat, Nat.add_one, Nat.pred_succ]
@[simp]
theorem succ'_pred' (n) : succ' (pred' n) = n :=
to_nat_inj.1 <| by
rw [succ'_to_nat, pred'_to_nat, Nat.add_one, Nat.succ_pred_eq_of_pos (to_nat_pos _)]
instance dvd : Dvd PosNum :=
⟨fun m n => pos m ∣ pos n⟩
@[norm_cast]
theorem dvd_to_nat {m n : PosNum} : (m : ℕ) ∣ n ↔ m ∣ n :=
Num.dvd_to_nat (pos m) (pos n)
theorem size_to_nat : ∀ n, (size n : ℕ) = Nat.size n
| 1 => Nat.size_one.symm
| bit0 n => by
rw [size, succ_to_nat, size_to_nat n, cast_bit0, ← two_mul]
erw [@Nat.size_bit false n]
have := to_nat_pos n
dsimp [Nat.bit]; omega
| bit1 n => by
rw [size, succ_to_nat, size_to_nat n, cast_bit1, ← two_mul]
erw [@Nat.size_bit true n]
dsimp [Nat.bit]; omega
theorem size_eq_natSize : ∀ n, (size n : ℕ) = natSize n
| 1 => rfl
| bit0 n => by rw [size, succ_to_nat, natSize, size_eq_natSize n]
| bit1 n => by rw [size, succ_to_nat, natSize, size_eq_natSize n]
theorem natSize_to_nat (n) : natSize n = Nat.size n := by rw [← size_eq_natSize, size_to_nat]
theorem natSize_pos (n) : 0 < natSize n := by cases n <;> apply Nat.succ_pos
/-- This tactic tries to turn an (in)equality about `PosNum`s to one about `Nat`s by rewriting.
```lean
example (n : PosNum) (m : PosNum) : n ≤ n + m := by
transfer_rw
exact Nat.le_add_right _ _
```
-/
scoped macro (name := transfer_rw) "transfer_rw" : tactic => `(tactic|
(repeat first | rw [← to_nat_inj] | rw [← lt_to_nat] | rw [← le_to_nat]
repeat first | rw [add_to_nat] | rw [mul_to_nat] | rw [cast_one] | rw [cast_zero]))
/--
This tactic tries to prove (in)equalities about `PosNum`s by transferring them to the `Nat` world
and then trying to call `simp`.
```lean
example (n : PosNum) (m : PosNum) : n ≤ n + m := by transfer
```
-/
scoped macro (name := transfer) "transfer" : tactic => `(tactic|
(intros; transfer_rw; try simp [add_comm, add_left_comm, mul_comm, mul_left_comm]))
instance addCommSemigroup : AddCommSemigroup PosNum where
add := (· + ·)
add_assoc := by transfer
add_comm := by transfer
instance commMonoid : CommMonoid PosNum where
mul := (· * ·)
one := (1 : PosNum)
npow := @npowRec PosNum ⟨1⟩ ⟨(· * ·)⟩
mul_assoc := by transfer
one_mul := by transfer
mul_one := by transfer
mul_comm := by transfer
instance distrib : Distrib PosNum where
add := (· + ·)
mul := (· * ·)
left_distrib := by transfer; simp [mul_add]
right_distrib := by transfer; simp [mul_add, mul_comm]
instance linearOrder : LinearOrder PosNum where
lt := (· < ·)
lt_iff_le_not_le := by
intro a b
transfer_rw
apply lt_iff_le_not_le
le := (· ≤ ·)
le_refl := by transfer
le_trans := by
intro a b c
transfer_rw
apply le_trans
le_antisymm := by
intro a b
transfer_rw
apply le_antisymm
le_total := by
intro a b
transfer_rw
apply le_total
toDecidableLT := by infer_instance
toDecidableLE := by infer_instance
toDecidableEq := by infer_instance
@[simp]
theorem cast_to_num (n : PosNum) : ↑n = Num.pos n := by rw [← cast_to_nat, ← of_to_nat n]
@[simp, norm_cast]
theorem bit_to_nat (b n) : (bit b n : ℕ) = Nat.bit b n := by cases b <;> simp [bit, two_mul]
@[simp, norm_cast]
theorem cast_add [AddMonoidWithOne α] (m n) : ((m + n : PosNum) : α) = m + n := by
rw [← cast_to_nat, add_to_nat, Nat.cast_add, cast_to_nat, cast_to_nat]
@[simp 500, norm_cast]
theorem cast_succ [AddMonoidWithOne α] (n : PosNum) : (succ n : α) = n + 1 := by
rw [← add_one, cast_add, cast_one]
@[simp, norm_cast]
theorem cast_inj [AddMonoidWithOne α] [CharZero α] {m n : PosNum} : (m : α) = n ↔ m = n := by
rw [← cast_to_nat m, ← cast_to_nat n, Nat.cast_inj, to_nat_inj]
@[simp]
theorem one_le_cast [Semiring α] [PartialOrder α] [IsStrictOrderedRing α] (n : PosNum) :
(1 : α) ≤ n := by
rw [← cast_to_nat, ← Nat.cast_one, Nat.cast_le (α := α)]; apply to_nat_pos
@[simp]
theorem cast_pos [Semiring α] [PartialOrder α] [IsStrictOrderedRing α] (n : PosNum) : 0 < (n : α) :=
lt_of_lt_of_le zero_lt_one (one_le_cast n)
@[simp, norm_cast]
theorem cast_mul [NonAssocSemiring α] (m n) : ((m * n : PosNum) : α) = m * n := by
rw [← cast_to_nat, mul_to_nat, Nat.cast_mul, cast_to_nat, cast_to_nat]
@[simp]
theorem cmp_eq (m n) : cmp m n = Ordering.eq ↔ m = n := by
have := cmp_to_nat m n
-- Porting note: `cases` didn't rewrite at `this`, so `revert` & `intro` are required.
revert this; cases cmp m n <;> intro this <;> simp at this ⊢ <;> try { exact this } <;>
simp [show m ≠ n from fun e => by rw [e] at this;exact lt_irrefl _ this]
@[simp, norm_cast]
theorem cast_lt [Semiring α] [PartialOrder α] [IsStrictOrderedRing α] {m n : PosNum} :
(m : α) < n ↔ m < n := by
rw [← cast_to_nat m, ← cast_to_nat n, Nat.cast_lt (α := α), lt_to_nat]
@[simp, norm_cast]
theorem cast_le [Semiring α] [LinearOrder α] [IsStrictOrderedRing α] {m n : PosNum} :
(m : α) ≤ n ↔ m ≤ n := by
rw [← not_lt]; exact not_congr cast_lt
end PosNum
namespace Num
variable {α : Type*}
open PosNum
theorem bit_to_nat (b n) : (bit b n : ℕ) = Nat.bit b n := by
cases b <;> cases n <;> simp [bit, two_mul] <;> rfl
theorem cast_succ' [AddMonoidWithOne α] (n) : (succ' n : α) = n + 1 := by
rw [← PosNum.cast_to_nat, succ'_to_nat, Nat.cast_add_one, cast_to_nat]
theorem cast_succ [AddMonoidWithOne α] (n) : (succ n : α) = n + 1 :=
cast_succ' n
@[simp, norm_cast]
theorem cast_add [AddMonoidWithOne α] (m n) : ((m + n : Num) : α) = m + n := by
rw [← cast_to_nat, add_to_nat, Nat.cast_add, cast_to_nat, cast_to_nat]
@[simp, norm_cast]
theorem cast_bit0 [NonAssocSemiring α] (n : Num) : (n.bit0 : α) = 2 * (n : α) := by
rw [← bit0_of_bit0, two_mul, cast_add]
@[simp, norm_cast]
theorem cast_bit1 [NonAssocSemiring α] (n : Num) : (n.bit1 : α) = 2 * (n : α) + 1 := by
rw [← bit1_of_bit1, bit0_of_bit0, cast_add, cast_bit0]; rfl
@[simp, norm_cast]
theorem cast_mul [NonAssocSemiring α] : ∀ m n, ((m * n : Num) : α) = m * n
| 0, 0 => (zero_mul _).symm
| 0, pos _q => (zero_mul _).symm
| pos _p, 0 => (mul_zero _).symm
| pos _p, pos _q => PosNum.cast_mul _ _
theorem size_to_nat : ∀ n, (size n : ℕ) = Nat.size n
| 0 => Nat.size_zero.symm
| pos p => p.size_to_nat
theorem size_eq_natSize : ∀ n, (size n : ℕ) = natSize n
| 0 => rfl
| pos p => p.size_eq_natSize
theorem natSize_to_nat (n) : natSize n = Nat.size n := by rw [← size_eq_natSize, size_to_nat]
@[simp 999]
theorem ofNat'_eq : ∀ n, Num.ofNat' n = n :=
Nat.binaryRec (by simp) fun b n IH => by tauto
theorem zneg_toZNum (n : Num) : -n.toZNum = n.toZNumNeg := by cases n <;> rfl
theorem zneg_toZNumNeg (n : Num) : -n.toZNumNeg = n.toZNum := by cases n <;> rfl
theorem toZNum_inj {m n : Num} : m.toZNum = n.toZNum ↔ m = n :=
⟨fun h => by cases m <;> cases n <;> cases h <;> rfl, congr_arg _⟩
@[simp]
theorem cast_toZNum [Zero α] [One α] [Add α] [Neg α] : ∀ n : Num, (n.toZNum : α) = n
| 0 => rfl
| Num.pos _p => rfl
@[simp]
theorem cast_toZNumNeg [SubtractionMonoid α] [One α] : ∀ n : Num, (n.toZNumNeg : α) = -n
| 0 => neg_zero.symm
| Num.pos _p => rfl
@[simp]
theorem add_toZNum (m n : Num) : Num.toZNum (m + n) = m.toZNum + n.toZNum := by
cases m <;> cases n <;> rfl
end Num
namespace PosNum
open Num
theorem pred_to_nat {n : PosNum} (h : 1 < n) : (pred n : ℕ) = Nat.pred n := by
unfold pred
cases e : pred' n
· have : (1 : ℕ) ≤ Nat.pred n := Nat.pred_le_pred ((@cast_lt ℕ _ _ _).2 h)
rw [← pred'_to_nat, e] at this
exact absurd this (by decide)
· rw [← pred'_to_nat, e]
rfl
theorem sub'_one (a : PosNum) : sub' a 1 = (pred' a).toZNum := by cases a <;> rfl
theorem one_sub' (a : PosNum) : sub' 1 a = (pred' a).toZNumNeg := by cases a <;> rfl
theorem lt_iff_cmp {m n} : m < n ↔ cmp m n = Ordering.lt :=
Iff.rfl
theorem le_iff_cmp {m n} : m ≤ n ↔ cmp m n ≠ Ordering.gt :=
not_congr <| lt_iff_cmp.trans <| by rw [← cmp_swap]; cases cmp m n <;> decide
end PosNum
namespace Num
variable {α : Type*}
open PosNum
theorem pred_to_nat : ∀ n : Num, (pred n : ℕ) = Nat.pred n
| 0 => rfl
| pos p => by rw [pred, PosNum.pred'_to_nat]; rfl
theorem ppred_to_nat : ∀ n : Num, (↑) <$> ppred n = Nat.ppred n
| 0 => rfl
| pos p => by
rw [ppred, Option.map_some, Nat.ppred_eq_some.2]
rw [PosNum.pred'_to_nat, Nat.succ_pred_eq_of_pos (PosNum.to_nat_pos _)]
rfl
theorem cmp_swap (m n) : (cmp m n).swap = cmp n m := by
cases m <;> cases n <;> try { rfl }; apply PosNum.cmp_swap
theorem cmp_eq (m n) : cmp m n = Ordering.eq ↔ m = n := by
have := cmp_to_nat m n
-- Porting note: `cases` didn't rewrite at `this`, so `revert` & `intro` are required.
revert this; cases cmp m n <;> intro this <;> simp at this ⊢ <;> try { exact this } <;>
simp [show m ≠ n from fun e => by rw [e] at this; exact lt_irrefl _ this]
@[simp, norm_cast]
theorem cast_lt [Semiring α] [PartialOrder α] [IsStrictOrderedRing α] {m n : Num} :
(m : α) < n ↔ m < n := by
rw [← cast_to_nat m, ← cast_to_nat n, Nat.cast_lt (α := α), lt_to_nat]
@[simp, norm_cast]
theorem cast_le [Semiring α] [LinearOrder α] [IsStrictOrderedRing α] {m n : Num} :
(m : α) ≤ n ↔ m ≤ n := by
rw [← not_lt]; exact not_congr cast_lt
@[simp, norm_cast]
theorem cast_inj [Semiring α] [PartialOrder α] [IsStrictOrderedRing α] {m n : Num} :
(m : α) = n ↔ m = n := by
rw [← cast_to_nat m, ← cast_to_nat n, Nat.cast_inj, to_nat_inj]
theorem lt_iff_cmp {m n} : m < n ↔ cmp m n = Ordering.lt :=
Iff.rfl
theorem le_iff_cmp {m n} : m ≤ n ↔ cmp m n ≠ Ordering.gt :=
not_congr <| lt_iff_cmp.trans <| by rw [← cmp_swap]; cases cmp m n <;> decide
theorem castNum_eq_bitwise {f : Num → Num → Num} {g : Bool → Bool → Bool}
(p : PosNum → PosNum → Num)
(gff : g false false = false) (f00 : f 0 0 = 0)
(f0n : ∀ n, f 0 (pos n) = cond (g false true) (pos n) 0)
(fn0 : ∀ n, f (pos n) 0 = cond (g true false) (pos n) 0)
(fnn : ∀ m n, f (pos m) (pos n) = p m n) (p11 : p 1 1 = cond (g true true) 1 0)
(p1b : ∀ b n, p 1 (PosNum.bit b n) = bit (g true b) (cond (g false true) (pos n) 0))
(pb1 : ∀ a m, p (PosNum.bit a m) 1 = bit (g a true) (cond (g true false) (pos m) 0))
(pbb : ∀ a b m n, p (PosNum.bit a m) (PosNum.bit b n) = bit (g a b) (p m n)) :
∀ m n : Num, (f m n : ℕ) = Nat.bitwise g m n := by
intros m n
obtain - | m := m <;> obtain - | n := n <;>
try simp only [show zero = 0 from rfl, show ((0 : Num) : ℕ) = 0 from rfl]
· rw [f00, Nat.bitwise_zero]; rfl
· rw [f0n, Nat.bitwise_zero_left]
cases g false true <;> rfl
· rw [fn0, Nat.bitwise_zero_right]
cases g true false <;> rfl
· rw [fnn]
have this b (n : PosNum) : (cond b (↑n) 0 : ℕ) = ↑(cond b (pos n) 0 : Num) := by
cases b <;> rfl
have this' b (n : PosNum) : ↑ (pos (PosNum.bit b n)) = Nat.bit b ↑n := by
cases b <;> simp
induction' m with m IH m IH generalizing n <;> obtain - | n | n := n
any_goals simp only [show one = 1 from rfl, show pos 1 = 1 from rfl,
show PosNum.bit0 = PosNum.bit false from rfl, show PosNum.bit1 = PosNum.bit true from rfl,
show ((1 : Num) : ℕ) = Nat.bit true 0 from rfl]
all_goals
repeat rw [this']
rw [Nat.bitwise_bit gff]
any_goals rw [Nat.bitwise_zero, p11]; cases g true true <;> rfl
any_goals rw [Nat.bitwise_zero_left, ← Bool.cond_eq_ite, this, ← bit_to_nat, p1b]
any_goals rw [Nat.bitwise_zero_right, ← Bool.cond_eq_ite, this, ← bit_to_nat, pb1]
all_goals
rw [← show ∀ n : PosNum, ↑(p m n) = Nat.bitwise g ↑m ↑n from IH]
rw [← bit_to_nat, pbb]
@[simp, norm_cast]
theorem castNum_or : ∀ m n : Num, ↑(m ||| n) = (↑m ||| ↑n : ℕ) := by
apply castNum_eq_bitwise fun x y => pos (PosNum.lor x y) <;>
(try rintro (_ | _)) <;> (try rintro (_ | _)) <;> intros <;> rfl
@[simp, norm_cast]
theorem castNum_and : ∀ m n : Num, ↑(m &&& n) = (↑m &&& ↑n : ℕ) := by
apply castNum_eq_bitwise PosNum.land <;> intros <;> (try cases_type* Bool) <;> rfl
@[simp, norm_cast]
theorem castNum_ldiff : ∀ m n : Num, (ldiff m n : ℕ) = Nat.ldiff m n := by
apply castNum_eq_bitwise PosNum.ldiff <;> intros <;> (try cases_type* Bool) <;> rfl
@[simp, norm_cast]
theorem castNum_xor : ∀ m n : Num, ↑(m ^^^ n) = (↑m ^^^ ↑n : ℕ) := by
apply castNum_eq_bitwise PosNum.lxor <;> intros <;> (try cases_type* Bool) <;> rfl
@[simp, norm_cast]
theorem castNum_shiftLeft (m : Num) (n : Nat) : ↑(m <<< n) = (m : ℕ) <<< (n : ℕ) := by
cases m <;> dsimp only [← shiftl_eq_shiftLeft, shiftl]
· symm
apply Nat.zero_shiftLeft
simp only [cast_pos]
induction' n with n IH
· rfl
simp [PosNum.shiftl_succ_eq_bit0_shiftl, Nat.shiftLeft_succ, IH, pow_succ, ← mul_assoc, mul_comm,
-shiftl_eq_shiftLeft, -PosNum.shiftl_eq_shiftLeft, shiftl, mul_two]
@[simp, norm_cast]
theorem castNum_shiftRight (m : Num) (n : Nat) : ↑(m >>> n) = (m : ℕ) >>> (n : ℕ) := by
obtain - | m := m <;> dsimp only [← shiftr_eq_shiftRight, shiftr]
· symm
apply Nat.zero_shiftRight
induction' n with n IH generalizing m
· cases m <;> rfl
have hdiv2 : ∀ m, Nat.div2 (m + m) = m := by intro; rw [Nat.div2_val]; omega
obtain - | m | m := m <;> dsimp only [PosNum.shiftr, ← PosNum.shiftr_eq_shiftRight]
· rw [Nat.shiftRight_eq_div_pow]
symm
apply Nat.div_eq_of_lt
simp
· trans
· apply IH
change Nat.shiftRight m n = Nat.shiftRight (m + m + 1) (n + 1)
rw [add_comm n 1, @Nat.shiftRight_eq _ (1 + n), Nat.shiftRight_add]
apply congr_arg fun x => Nat.shiftRight x n
simp [-add_assoc, Nat.shiftRight_succ, Nat.shiftRight_zero, ← Nat.div2_val, hdiv2]
· trans
· apply IH
change Nat.shiftRight m n = Nat.shiftRight (m + m) (n + 1)
rw [add_comm n 1, @Nat.shiftRight_eq _ (1 + n), Nat.shiftRight_add]
apply congr_arg fun x => Nat.shiftRight x n
simp [-add_assoc, Nat.shiftRight_succ, Nat.shiftRight_zero, ← Nat.div2_val, hdiv2]
@[simp]
theorem castNum_testBit (m n) : testBit m n = Nat.testBit m n := by
cases m with dsimp only [testBit]
| zero =>
rw [show (Num.zero : Nat) = 0 from rfl, Nat.zero_testBit]
| pos m =>
rw [cast_pos]
induction' n with n IH generalizing m <;> obtain - | m | m := m
<;> simp only [PosNum.testBit]
· rfl
· rw [PosNum.cast_bit1, ← two_mul, ← congr_fun Nat.bit_true, Nat.testBit_bit_zero]
· rw [PosNum.cast_bit0, ← two_mul, ← congr_fun Nat.bit_false, Nat.testBit_bit_zero]
· simp [Nat.testBit_add_one]
· rw [PosNum.cast_bit1, ← two_mul, ← congr_fun Nat.bit_true, Nat.testBit_bit_succ, IH]
· rw [PosNum.cast_bit0, ← two_mul, ← congr_fun Nat.bit_false, Nat.testBit_bit_succ, IH]
end Num
namespace Int
/-- Cast a `SNum` to the corresponding integer. -/
def ofSnum : SNum → ℤ :=
SNum.rec' (fun a => cond a (-1) 0) fun a _p IH => cond a (2 * IH + 1) (2 * IH)
instance snumCoe : Coe SNum ℤ :=
⟨ofSnum⟩
end Int
instance SNum.lt : LT SNum :=
⟨fun a b => (a : ℤ) < b⟩
instance SNum.le : LE SNum :=
⟨fun a b => (a : ℤ) ≤ b⟩
| Mathlib/Data/Num/Lemmas.lean | 1,567 | 1,584 | |
/-
Copyright (c) 2018 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes, Johannes Hölzl, Kim Morrison, Jens Wagemaker
-/
import Mathlib.Algebra.MonoidAlgebra.Degree
import Mathlib.Algebra.Order.Ring.WithTop
import Mathlib.Algebra.Polynomial.Basic
import Mathlib.Data.Nat.Cast.WithTop
import Mathlib.Data.Nat.SuccPred
import Mathlib.Order.SuccPred.WithBot
/-!
# Degree of univariate polynomials
## Main definitions
* `Polynomial.degree`: the degree of a polynomial, where `0` has degree `⊥`
* `Polynomial.natDegree`: the degree of a polynomial, where `0` has degree `0`
* `Polynomial.leadingCoeff`: the leading coefficient of a polynomial
* `Polynomial.Monic`: a polynomial is monic if its leading coefficient is 0
* `Polynomial.nextCoeff`: the next coefficient after the leading coefficient
## Main results
* `Polynomial.degree_eq_natDegree`: the degree and natDegree coincide for nonzero polynomials
-/
noncomputable section
open Finsupp Finset
open Polynomial
namespace Polynomial
universe u v
variable {R : Type u} {S : Type v} {a b c d : R} {n m : ℕ}
section Semiring
variable [Semiring R] {p q r : R[X]}
/-- `degree p` is the degree of the polynomial `p`, i.e. the largest `X`-exponent in `p`.
`degree p = some n` when `p ≠ 0` and `n` is the highest power of `X` that appears in `p`, otherwise
`degree 0 = ⊥`. -/
def degree (p : R[X]) : WithBot ℕ :=
p.support.max
/-- `natDegree p` forces `degree p` to ℕ, by defining `natDegree 0 = 0`. -/
def natDegree (p : R[X]) : ℕ :=
(degree p).unbotD 0
/-- `leadingCoeff p` gives the coefficient of the highest power of `X` in `p`. -/
def leadingCoeff (p : R[X]) : R :=
coeff p (natDegree p)
/-- a polynomial is `Monic` if its leading coefficient is 1 -/
def Monic (p : R[X]) :=
leadingCoeff p = (1 : R)
theorem Monic.def : Monic p ↔ leadingCoeff p = 1 :=
Iff.rfl
instance Monic.decidable [DecidableEq R] : Decidable (Monic p) := by unfold Monic; infer_instance
@[simp]
theorem Monic.leadingCoeff {p : R[X]} (hp : p.Monic) : leadingCoeff p = 1 :=
hp
theorem Monic.coeff_natDegree {p : R[X]} (hp : p.Monic) : p.coeff p.natDegree = 1 :=
hp
@[simp]
theorem degree_zero : degree (0 : R[X]) = ⊥ :=
rfl
@[simp]
theorem natDegree_zero : natDegree (0 : R[X]) = 0 :=
rfl
@[simp]
theorem coeff_natDegree : coeff p (natDegree p) = leadingCoeff p :=
rfl
@[simp]
theorem degree_eq_bot : degree p = ⊥ ↔ p = 0 :=
⟨fun h => support_eq_empty.1 (Finset.max_eq_bot.1 h), fun h => h.symm ▸ rfl⟩
theorem degree_ne_bot : degree p ≠ ⊥ ↔ p ≠ 0 := degree_eq_bot.not
theorem degree_eq_natDegree (hp : p ≠ 0) : degree p = (natDegree p : WithBot ℕ) := by
let ⟨n, hn⟩ := not_forall.1 (mt Option.eq_none_iff_forall_not_mem.2 (mt degree_eq_bot.1 hp))
have hn : degree p = some n := Classical.not_not.1 hn
rw [natDegree, hn]; rfl
theorem degree_eq_iff_natDegree_eq {p : R[X]} {n : ℕ} (hp : p ≠ 0) :
p.degree = n ↔ p.natDegree = n := by rw [degree_eq_natDegree hp]; exact WithBot.coe_eq_coe
theorem degree_eq_iff_natDegree_eq_of_pos {p : R[X]} {n : ℕ} (hn : 0 < n) :
p.degree = n ↔ p.natDegree = n := by
obtain rfl|h := eq_or_ne p 0
· simp [hn.ne]
· exact degree_eq_iff_natDegree_eq h
theorem natDegree_eq_of_degree_eq_some {p : R[X]} {n : ℕ} (h : degree p = n) : natDegree p = n := by
rw [natDegree, h, Nat.cast_withBot, WithBot.unbotD_coe]
theorem degree_ne_of_natDegree_ne {n : ℕ} : p.natDegree ≠ n → degree p ≠ n :=
mt natDegree_eq_of_degree_eq_some
@[simp]
theorem degree_le_natDegree : degree p ≤ natDegree p :=
WithBot.giUnbotDBot.gc.le_u_l _
theorem natDegree_eq_of_degree_eq [Semiring S] {q : S[X]} (h : degree p = degree q) :
natDegree p = natDegree q := by unfold natDegree; rw [h]
theorem le_degree_of_ne_zero (h : coeff p n ≠ 0) : (n : WithBot ℕ) ≤ degree p := by
rw [Nat.cast_withBot]
exact Finset.le_sup (mem_support_iff.2 h)
theorem degree_mono [Semiring S] {f : R[X]} {g : S[X]} (h : f.support ⊆ g.support) :
f.degree ≤ g.degree :=
Finset.sup_mono h
theorem degree_le_degree (h : coeff q (natDegree p) ≠ 0) : degree p ≤ degree q := by
by_cases hp : p = 0
· rw [hp, degree_zero]
exact bot_le
· rw [degree_eq_natDegree hp]
exact le_degree_of_ne_zero h
theorem natDegree_le_iff_degree_le {n : ℕ} : natDegree p ≤ n ↔ degree p ≤ n :=
WithBot.unbotD_le_iff (fun _ ↦ bot_le)
theorem natDegree_lt_iff_degree_lt (hp : p ≠ 0) : p.natDegree < n ↔ p.degree < ↑n :=
WithBot.unbotD_lt_iff (absurd · (degree_eq_bot.not.mpr hp))
alias ⟨degree_le_of_natDegree_le, natDegree_le_of_degree_le⟩ := natDegree_le_iff_degree_le
theorem natDegree_le_natDegree [Semiring S] {q : S[X]} (hpq : p.degree ≤ q.degree) :
p.natDegree ≤ q.natDegree :=
WithBot.giUnbotDBot.gc.monotone_l hpq
@[simp]
theorem degree_C (ha : a ≠ 0) : degree (C a) = (0 : WithBot ℕ) := by
rw [degree, ← monomial_zero_left, support_monomial 0 ha, max_eq_sup_coe, sup_singleton,
WithBot.coe_zero]
theorem degree_C_le : degree (C a) ≤ 0 := by
by_cases h : a = 0
· rw [h, C_0]
exact bot_le
· rw [degree_C h]
theorem degree_C_lt : degree (C a) < 1 :=
degree_C_le.trans_lt <| WithBot.coe_lt_coe.mpr zero_lt_one
theorem degree_one_le : degree (1 : R[X]) ≤ (0 : WithBot ℕ) := by rw [← C_1]; exact degree_C_le
@[simp]
theorem natDegree_C (a : R) : natDegree (C a) = 0 := by
by_cases ha : a = 0
· have : C a = 0 := by rw [ha, C_0]
rw [natDegree, degree_eq_bot.2 this, WithBot.unbotD_bot]
· rw [natDegree, degree_C ha, WithBot.unbotD_zero]
@[simp]
theorem natDegree_one : natDegree (1 : R[X]) = 0 :=
natDegree_C 1
@[simp]
theorem natDegree_natCast (n : ℕ) : natDegree (n : R[X]) = 0 := by
simp only [← C_eq_natCast, natDegree_C]
@[simp]
theorem natDegree_ofNat (n : ℕ) [Nat.AtLeastTwo n] :
natDegree (ofNat(n) : R[X]) = 0 :=
natDegree_natCast _
theorem degree_natCast_le (n : ℕ) : degree (n : R[X]) ≤ 0 := degree_le_of_natDegree_le (by simp)
@[simp]
theorem degree_monomial (n : ℕ) (ha : a ≠ 0) : degree (monomial n a) = n := by
rw [degree, support_monomial n ha, max_singleton, Nat.cast_withBot]
@[simp]
theorem degree_C_mul_X_pow (n : ℕ) (ha : a ≠ 0) : degree (C a * X ^ n) = n := by
rw [C_mul_X_pow_eq_monomial, degree_monomial n ha]
theorem degree_C_mul_X (ha : a ≠ 0) : degree (C a * X) = 1 := by
simpa only [pow_one] using degree_C_mul_X_pow 1 ha
theorem degree_monomial_le (n : ℕ) (a : R) : degree (monomial n a) ≤ n :=
letI := Classical.decEq R
if h : a = 0 then by rw [h, (monomial n).map_zero, degree_zero]; exact bot_le
else le_of_eq (degree_monomial n h)
theorem degree_C_mul_X_pow_le (n : ℕ) (a : R) : degree (C a * X ^ n) ≤ n := by
rw [C_mul_X_pow_eq_monomial]
apply degree_monomial_le
theorem degree_C_mul_X_le (a : R) : degree (C a * X) ≤ 1 := by
simpa only [pow_one] using degree_C_mul_X_pow_le 1 a
@[simp]
theorem natDegree_C_mul_X_pow (n : ℕ) (a : R) (ha : a ≠ 0) : natDegree (C a * X ^ n) = n :=
natDegree_eq_of_degree_eq_some (degree_C_mul_X_pow n ha)
@[simp]
theorem natDegree_C_mul_X (a : R) (ha : a ≠ 0) : natDegree (C a * X) = 1 := by
simpa only [pow_one] using natDegree_C_mul_X_pow 1 a ha
@[simp]
theorem natDegree_monomial [DecidableEq R] (i : ℕ) (r : R) :
natDegree (monomial i r) = if r = 0 then 0 else i := by
split_ifs with hr
· simp [hr]
· rw [← C_mul_X_pow_eq_monomial, natDegree_C_mul_X_pow i r hr]
theorem natDegree_monomial_le (a : R) {m : ℕ} : (monomial m a).natDegree ≤ m := by
classical
rw [Polynomial.natDegree_monomial]
split_ifs
exacts [Nat.zero_le _, le_rfl]
theorem natDegree_monomial_eq (i : ℕ) {r : R} (r0 : r ≠ 0) : (monomial i r).natDegree = i :=
letI := Classical.decEq R
Eq.trans (natDegree_monomial _ _) (if_neg r0)
theorem coeff_ne_zero_of_eq_degree (hn : degree p = n) : coeff p n ≠ 0 := fun h =>
mem_support_iff.mp (mem_of_max hn) h
theorem degree_X_pow_le (n : ℕ) : degree (X ^ n : R[X]) ≤ n := by
simpa only [C_1, one_mul] using degree_C_mul_X_pow_le n (1 : R)
theorem degree_X_le : degree (X : R[X]) ≤ 1 :=
degree_monomial_le _ _
theorem natDegree_X_le : (X : R[X]).natDegree ≤ 1 :=
natDegree_le_of_degree_le degree_X_le
theorem withBotSucc_degree_eq_natDegree_add_one (h : p ≠ 0) : p.degree.succ = p.natDegree + 1 := by
rw [degree_eq_natDegree h]
exact WithBot.succ_coe p.natDegree
end Semiring
section NonzeroSemiring
variable [Semiring R] [Nontrivial R] {p q : R[X]}
@[simp]
theorem degree_one : degree (1 : R[X]) = (0 : WithBot ℕ) :=
degree_C one_ne_zero
@[simp]
theorem degree_X : degree (X : R[X]) = 1 :=
degree_monomial _ one_ne_zero
@[simp]
theorem natDegree_X : (X : R[X]).natDegree = 1 :=
natDegree_eq_of_degree_eq_some degree_X
end NonzeroSemiring
section Ring
variable [Ring R]
@[simp]
theorem degree_neg (p : R[X]) : degree (-p) = degree p := by unfold degree; rw [support_neg]
theorem degree_neg_le_of_le {a : WithBot ℕ} {p : R[X]} (hp : degree p ≤ a) : degree (-p) ≤ a :=
p.degree_neg.le.trans hp
@[simp]
theorem natDegree_neg (p : R[X]) : natDegree (-p) = natDegree p := by simp [natDegree]
theorem natDegree_neg_le_of_le {p : R[X]} (hp : natDegree p ≤ m) : natDegree (-p) ≤ m :=
(natDegree_neg p).le.trans hp
@[simp]
theorem natDegree_intCast (n : ℤ) : natDegree (n : R[X]) = 0 := by
rw [← C_eq_intCast, natDegree_C]
theorem degree_intCast_le (n : ℤ) : degree (n : R[X]) ≤ 0 := degree_le_of_natDegree_le (by simp)
@[simp]
theorem leadingCoeff_neg (p : R[X]) : (-p).leadingCoeff = -p.leadingCoeff := by
rw [leadingCoeff, leadingCoeff, natDegree_neg, coeff_neg]
end Ring
section Semiring
variable [Semiring R] {p : R[X]}
/-- The second-highest coefficient, or 0 for constants -/
def nextCoeff (p : R[X]) : R :=
if p.natDegree = 0 then 0 else p.coeff (p.natDegree - 1)
lemma nextCoeff_eq_zero :
p.nextCoeff = 0 ↔ p.natDegree = 0 ∨ 0 < p.natDegree ∧ p.coeff (p.natDegree - 1) = 0 := by
simp [nextCoeff, or_iff_not_imp_left, pos_iff_ne_zero]; aesop
lemma nextCoeff_ne_zero : p.nextCoeff ≠ 0 ↔ p.natDegree ≠ 0 ∧ p.coeff (p.natDegree - 1) ≠ 0 := by
simp [nextCoeff]
@[simp]
theorem nextCoeff_C_eq_zero (c : R) : nextCoeff (C c) = 0 := by
rw [nextCoeff]
simp
theorem nextCoeff_of_natDegree_pos (hp : 0 < p.natDegree) :
nextCoeff p = p.coeff (p.natDegree - 1) := by
rw [nextCoeff, if_neg]
contrapose! hp
simpa
variable {p q : R[X]} {ι : Type*}
theorem degree_add_le (p q : R[X]) : degree (p + q) ≤ max (degree p) (degree q) := by
simpa only [degree, ← support_toFinsupp, toFinsupp_add]
using AddMonoidAlgebra.sup_support_add_le _ _ _
theorem degree_add_le_of_degree_le {p q : R[X]} {n : ℕ} (hp : degree p ≤ n) (hq : degree q ≤ n) :
degree (p + q) ≤ n :=
(degree_add_le p q).trans <| max_le hp hq
theorem degree_add_le_of_le {a b : WithBot ℕ} (hp : degree p ≤ a) (hq : degree q ≤ b) :
degree (p + q) ≤ max a b :=
(p.degree_add_le q).trans <| max_le_max ‹_› ‹_›
theorem natDegree_add_le (p q : R[X]) : natDegree (p + q) ≤ max (natDegree p) (natDegree q) := by
rcases le_max_iff.1 (degree_add_le p q) with h | h <;> simp [natDegree_le_natDegree h]
theorem natDegree_add_le_of_degree_le {p q : R[X]} {n : ℕ} (hp : natDegree p ≤ n)
(hq : natDegree q ≤ n) : natDegree (p + q) ≤ n :=
(natDegree_add_le p q).trans <| max_le hp hq
theorem natDegree_add_le_of_le (hp : natDegree p ≤ m) (hq : natDegree q ≤ n) :
natDegree (p + q) ≤ max m n :=
(p.natDegree_add_le q).trans <| max_le_max ‹_› ‹_›
@[simp]
theorem leadingCoeff_zero : leadingCoeff (0 : R[X]) = 0 :=
rfl
@[simp]
theorem leadingCoeff_eq_zero : leadingCoeff p = 0 ↔ p = 0 :=
⟨fun h =>
Classical.by_contradiction fun hp =>
mt mem_support_iff.1 (Classical.not_not.2 h) (mem_of_max (degree_eq_natDegree hp)),
fun h => h.symm ▸ leadingCoeff_zero⟩
theorem leadingCoeff_ne_zero : leadingCoeff p ≠ 0 ↔ p ≠ 0 := by rw [Ne, leadingCoeff_eq_zero]
theorem leadingCoeff_eq_zero_iff_deg_eq_bot : leadingCoeff p = 0 ↔ degree p = ⊥ := by
rw [leadingCoeff_eq_zero, degree_eq_bot]
theorem natDegree_C_mul_X_pow_le (a : R) (n : ℕ) : natDegree (C a * X ^ n) ≤ n :=
natDegree_le_iff_degree_le.2 <| degree_C_mul_X_pow_le _ _
theorem degree_erase_le (p : R[X]) (n : ℕ) : degree (p.erase n) ≤ degree p := by
rcases p with ⟨p⟩
simp only [erase_def, degree, coeff, support]
apply sup_mono
rw [Finsupp.support_erase]
apply Finset.erase_subset
theorem degree_erase_lt (hp : p ≠ 0) : degree (p.erase (natDegree p)) < degree p := by
apply lt_of_le_of_ne (degree_erase_le _ _)
rw [degree_eq_natDegree hp, degree, support_erase]
exact fun h => not_mem_erase _ _ (mem_of_max h)
theorem degree_update_le (p : R[X]) (n : ℕ) (a : R) : degree (p.update n a) ≤ max (degree p) n := by
classical
rw [degree, support_update]
split_ifs
· exact (Finset.max_mono (erase_subset _ _)).trans (le_max_left _ _)
· rw [max_insert, max_comm]
exact le_rfl
theorem degree_sum_le (s : Finset ι) (f : ι → R[X]) :
degree (∑ i ∈ s, f i) ≤ s.sup fun b => degree (f b) :=
Finset.cons_induction_on s (by simp only [sum_empty, sup_empty, degree_zero, le_refl])
fun a s has ih =>
calc
degree (∑ i ∈ cons a s has, f i) ≤ max (degree (f a)) (degree (∑ i ∈ s, f i)) := by
rw [Finset.sum_cons]; exact degree_add_le _ _
_ ≤ _ := by rw [sup_cons]; exact max_le_max le_rfl ih
theorem degree_mul_le (p q : R[X]) : degree (p * q) ≤ degree p + degree q := by
simpa only [degree, ← support_toFinsupp, toFinsupp_mul]
using AddMonoidAlgebra.sup_support_mul_le (WithBot.coe_add _ _).le _ _
theorem degree_mul_le_of_le {a b : WithBot ℕ} (hp : degree p ≤ a) (hq : degree q ≤ b) :
degree (p * q) ≤ a + b :=
(p.degree_mul_le _).trans <| add_le_add ‹_› ‹_›
theorem degree_pow_le (p : R[X]) : ∀ n : ℕ, degree (p ^ n) ≤ n • degree p
| 0 => by rw [pow_zero, zero_nsmul]; exact degree_one_le
| n + 1 =>
calc
degree (p ^ (n + 1)) ≤ degree (p ^ n) + degree p := by
rw [pow_succ]; exact degree_mul_le _ _
_ ≤ _ := by rw [succ_nsmul]; exact add_le_add_right (degree_pow_le _ _) _
theorem degree_pow_le_of_le {a : WithBot ℕ} (b : ℕ) (hp : degree p ≤ a) :
degree (p ^ b) ≤ b * a := by
induction b with
| zero => simp [degree_one_le]
| succ n hn =>
rw [Nat.cast_succ, add_mul, one_mul, pow_succ]
exact degree_mul_le_of_le hn hp
@[simp]
theorem leadingCoeff_monomial (a : R) (n : ℕ) : leadingCoeff (monomial n a) = a := by
classical
by_cases ha : a = 0
· simp only [ha, (monomial n).map_zero, leadingCoeff_zero]
· rw [leadingCoeff, natDegree_monomial, if_neg ha, coeff_monomial]
simp
theorem leadingCoeff_C_mul_X_pow (a : R) (n : ℕ) : leadingCoeff (C a * X ^ n) = a := by
rw [C_mul_X_pow_eq_monomial, leadingCoeff_monomial]
theorem leadingCoeff_C_mul_X (a : R) : leadingCoeff (C a * X) = a := by
simpa only [pow_one] using leadingCoeff_C_mul_X_pow a 1
@[simp]
theorem leadingCoeff_C (a : R) : leadingCoeff (C a) = a :=
leadingCoeff_monomial a 0
theorem leadingCoeff_X_pow (n : ℕ) : leadingCoeff ((X : R[X]) ^ n) = 1 := by
simpa only [C_1, one_mul] using leadingCoeff_C_mul_X_pow (1 : R) n
theorem leadingCoeff_X : leadingCoeff (X : R[X]) = 1 := by
simpa only [pow_one] using @leadingCoeff_X_pow R _ 1
@[simp]
theorem monic_X_pow (n : ℕ) : Monic (X ^ n : R[X]) :=
leadingCoeff_X_pow n
@[simp]
theorem monic_X : Monic (X : R[X]) :=
leadingCoeff_X
theorem leadingCoeff_one : leadingCoeff (1 : R[X]) = 1 :=
leadingCoeff_C 1
@[simp]
theorem monic_one : Monic (1 : R[X]) :=
leadingCoeff_C _
theorem Monic.ne_zero {R : Type*} [Semiring R] [Nontrivial R] {p : R[X]} (hp : p.Monic) :
p ≠ 0 := by
rintro rfl
simp [Monic] at hp
theorem Monic.ne_zero_of_ne (h : (0 : R) ≠ 1) {p : R[X]} (hp : p.Monic) : p ≠ 0 := by
nontriviality R
exact hp.ne_zero
theorem Monic.ne_zero_of_polynomial_ne {r} (hp : Monic p) (hne : q ≠ r) : p ≠ 0 :=
haveI := Nontrivial.of_polynomial_ne hne
hp.ne_zero
theorem natDegree_mul_le {p q : R[X]} : natDegree (p * q) ≤ natDegree p + natDegree q := by
apply natDegree_le_of_degree_le
apply le_trans (degree_mul_le p q)
rw [Nat.cast_add]
apply add_le_add <;> apply degree_le_natDegree
theorem natDegree_mul_le_of_le (hp : natDegree p ≤ m) (hg : natDegree q ≤ n) :
natDegree (p * q) ≤ m + n :=
natDegree_mul_le.trans <| add_le_add ‹_› ‹_›
theorem natDegree_pow_le {p : R[X]} {n : ℕ} : (p ^ n).natDegree ≤ n * p.natDegree := by
induction n with
| zero => simp
| succ i hi =>
rw [pow_succ, Nat.succ_mul]
apply le_trans natDegree_mul_le (add_le_add_right hi _)
theorem natDegree_pow_le_of_le (n : ℕ) (hp : natDegree p ≤ m) :
natDegree (p ^ n) ≤ n * m :=
natDegree_pow_le.trans (Nat.mul_le_mul le_rfl ‹_›)
theorem natDegree_eq_zero_iff_degree_le_zero : p.natDegree = 0 ↔ p.degree ≤ 0 := by
rw [← nonpos_iff_eq_zero, natDegree_le_iff_degree_le, Nat.cast_zero]
theorem degree_zero_le : degree (0 : R[X]) ≤ 0 := natDegree_eq_zero_iff_degree_le_zero.mp rfl
theorem degree_le_iff_coeff_zero (f : R[X]) (n : WithBot ℕ) :
degree f ≤ n ↔ ∀ m : ℕ, n < m → coeff f m = 0 := by
simp only [degree, Finset.max, Finset.sup_le_iff, mem_support_iff, Ne, ← not_le,
not_imp_comm, Nat.cast_withBot]
theorem degree_lt_iff_coeff_zero (f : R[X]) (n : ℕ) :
degree f < n ↔ ∀ m : ℕ, n ≤ m → coeff f m = 0 := by
simp only [degree, Finset.sup_lt_iff (WithBot.bot_lt_coe n), mem_support_iff,
WithBot.coe_lt_coe, ← @not_le ℕ, max_eq_sup_coe, Nat.cast_withBot, Ne, not_imp_not]
theorem natDegree_pos_iff_degree_pos : 0 < natDegree p ↔ 0 < degree p :=
lt_iff_lt_of_le_iff_le natDegree_le_iff_degree_le
end Semiring
section NontrivialSemiring
variable [Semiring R] [Nontrivial R] {p q : R[X]} (n : ℕ)
@[simp]
theorem degree_X_pow : degree ((X : R[X]) ^ n) = n := by
rw [X_pow_eq_monomial, degree_monomial _ (one_ne_zero' R)]
@[simp]
theorem natDegree_X_pow : natDegree ((X : R[X]) ^ n) = n :=
natDegree_eq_of_degree_eq_some (degree_X_pow n)
end NontrivialSemiring
section Ring
variable [Ring R] {p q : R[X]}
theorem degree_sub_le (p q : R[X]) : degree (p - q) ≤ max (degree p) (degree q) := by
simpa only [degree_neg q] using degree_add_le p (-q)
theorem degree_sub_le_of_le {a b : WithBot ℕ} (hp : degree p ≤ a) (hq : degree q ≤ b) :
degree (p - q) ≤ max a b :=
(p.degree_sub_le q).trans <| max_le_max ‹_› ‹_›
theorem natDegree_sub_le (p q : R[X]) : natDegree (p - q) ≤ max (natDegree p) (natDegree q) := by
simpa only [← natDegree_neg q] using natDegree_add_le p (-q)
theorem natDegree_sub_le_of_le (hp : natDegree p ≤ m) (hq : natDegree q ≤ n) :
natDegree (p - q) ≤ max m n :=
(p.natDegree_sub_le q).trans <| max_le_max ‹_› ‹_›
theorem degree_sub_lt (hd : degree p = degree q) (hp0 : p ≠ 0)
(hlc : leadingCoeff p = leadingCoeff q) : degree (p - q) < degree p :=
have hp : monomial (natDegree p) (leadingCoeff p) + p.erase (natDegree p) = p :=
monomial_add_erase _ _
have hq : monomial (natDegree q) (leadingCoeff q) + q.erase (natDegree q) = q :=
monomial_add_erase _ _
have hd' : natDegree p = natDegree q := by unfold natDegree; rw [hd]
have hq0 : q ≠ 0 := mt degree_eq_bot.2 (hd ▸ mt degree_eq_bot.1 hp0)
calc
degree (p - q) = degree (erase (natDegree q) p + -erase (natDegree q) q) := by
conv =>
lhs
rw [← hp, ← hq, hlc, hd', add_sub_add_left_eq_sub, sub_eq_add_neg]
_ ≤ max (degree (erase (natDegree q) p)) (degree (erase (natDegree q) q)) :=
(degree_neg (erase (natDegree q) q) ▸ degree_add_le _ _)
_ < degree p := max_lt_iff.2 ⟨hd' ▸ degree_erase_lt hp0, hd.symm ▸ degree_erase_lt hq0⟩
theorem degree_X_sub_C_le (r : R) : (X - C r).degree ≤ 1 :=
(degree_sub_le _ _).trans (max_le degree_X_le (degree_C_le.trans zero_le_one))
theorem natDegree_X_sub_C_le (r : R) : (X - C r).natDegree ≤ 1 :=
natDegree_le_iff_degree_le.2 <| degree_X_sub_C_le r
end Ring
end Polynomial
| Mathlib/Algebra/Polynomial/Degree/Definitions.lean | 777 | 784 | |
/-
Copyright (c) 2019 Zhouhang Zhou. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Zhouhang Zhou, Sébastien Gouëzel, Frédéric Dupuis
-/
import Mathlib.Algebra.BigOperators.Field
import Mathlib.Analysis.Complex.Basic
import Mathlib.Analysis.InnerProductSpace.Defs
import Mathlib.GroupTheory.MonoidLocalization.Basic
/-!
# Properties of inner product spaces
This file proves many basic properties of inner product spaces (real or complex).
## Main results
- `inner_mul_inner_self_le`: the Cauchy-Schwartz inequality (one of many variants).
- `norm_inner_eq_norm_iff`: the equality criteion in the Cauchy-Schwartz inequality (also in many
variants).
- `inner_eq_sum_norm_sq_div_four`: the polarization identity.
## Tags
inner product space, Hilbert space, norm
-/
noncomputable section
open RCLike Real Filter Topology ComplexConjugate Finsupp
open LinearMap (BilinForm)
variable {𝕜 E F : Type*} [RCLike 𝕜]
section BasicProperties_Seminormed
open scoped InnerProductSpace
variable [SeminormedAddCommGroup E] [InnerProductSpace 𝕜 E]
variable [SeminormedAddCommGroup F] [InnerProductSpace ℝ F]
local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y
local postfix:90 "†" => starRingEnd _
export InnerProductSpace (norm_sq_eq_re_inner)
@[simp]
theorem inner_conj_symm (x y : E) : ⟪y, x⟫† = ⟪x, y⟫ :=
InnerProductSpace.conj_inner_symm _ _
theorem real_inner_comm (x y : F) : ⟪y, x⟫_ℝ = ⟪x, y⟫_ℝ :=
@inner_conj_symm ℝ _ _ _ _ x y
theorem inner_eq_zero_symm {x y : E} : ⟪x, y⟫ = 0 ↔ ⟪y, x⟫ = 0 := by
rw [← inner_conj_symm]
exact star_eq_zero
@[simp]
theorem inner_self_im (x : E) : im ⟪x, x⟫ = 0 := by rw [← @ofReal_inj 𝕜, im_eq_conj_sub]; simp
theorem inner_add_left (x y z : E) : ⟪x + y, z⟫ = ⟪x, z⟫ + ⟪y, z⟫ :=
InnerProductSpace.add_left _ _ _
theorem inner_add_right (x y z : E) : ⟪x, y + z⟫ = ⟪x, y⟫ + ⟪x, z⟫ := by
rw [← inner_conj_symm, inner_add_left, RingHom.map_add]
simp only [inner_conj_symm]
theorem inner_re_symm (x y : E) : re ⟪x, y⟫ = re ⟪y, x⟫ := by rw [← inner_conj_symm, conj_re]
theorem inner_im_symm (x y : E) : im ⟪x, y⟫ = -im ⟪y, x⟫ := by rw [← inner_conj_symm, conj_im]
section Algebra
variable {𝕝 : Type*} [CommSemiring 𝕝] [StarRing 𝕝] [Algebra 𝕝 𝕜] [Module 𝕝 E]
[IsScalarTower 𝕝 𝕜 E] [StarModule 𝕝 𝕜]
/-- See `inner_smul_left` for the common special when `𝕜 = 𝕝`. -/
lemma inner_smul_left_eq_star_smul (x y : E) (r : 𝕝) : ⟪r • x, y⟫ = r† • ⟪x, y⟫ := by
rw [← algebraMap_smul 𝕜 r, InnerProductSpace.smul_left, starRingEnd_apply, starRingEnd_apply,
← algebraMap_star_comm, ← smul_eq_mul, algebraMap_smul]
/-- Special case of `inner_smul_left_eq_star_smul` when the acting ring has a trivial star
(eg `ℕ`, `ℤ`, `ℚ≥0`, `ℚ`, `ℝ`). -/
lemma inner_smul_left_eq_smul [TrivialStar 𝕝] (x y : E) (r : 𝕝) : ⟪r • x, y⟫ = r • ⟪x, y⟫ := by
rw [inner_smul_left_eq_star_smul, starRingEnd_apply, star_trivial]
/-- See `inner_smul_right` for the common special when `𝕜 = 𝕝`. -/
lemma inner_smul_right_eq_smul (x y : E) (r : 𝕝) : ⟪x, r • y⟫ = r • ⟪x, y⟫ := by
rw [← inner_conj_symm, inner_smul_left_eq_star_smul, starRingEnd_apply, starRingEnd_apply,
star_smul, star_star, ← starRingEnd_apply, inner_conj_symm]
end Algebra
/-- See `inner_smul_left_eq_star_smul` for the case of a general algebra action. -/
theorem inner_smul_left (x y : E) (r : 𝕜) : ⟪r • x, y⟫ = r† * ⟪x, y⟫ :=
inner_smul_left_eq_star_smul ..
theorem real_inner_smul_left (x y : F) (r : ℝ) : ⟪r • x, y⟫_ℝ = r * ⟪x, y⟫_ℝ :=
inner_smul_left _ _ _
theorem inner_smul_real_left (x y : E) (r : ℝ) : ⟪(r : 𝕜) • x, y⟫ = r • ⟪x, y⟫ := by
rw [inner_smul_left, conj_ofReal, Algebra.smul_def]
/-- See `inner_smul_right_eq_smul` for the case of a general algebra action. -/
theorem inner_smul_right (x y : E) (r : 𝕜) : ⟪x, r • y⟫ = r * ⟪x, y⟫ :=
inner_smul_right_eq_smul ..
theorem real_inner_smul_right (x y : F) (r : ℝ) : ⟪x, r • y⟫_ℝ = r * ⟪x, y⟫_ℝ :=
inner_smul_right _ _ _
theorem inner_smul_real_right (x y : E) (r : ℝ) : ⟪x, (r : 𝕜) • y⟫ = r • ⟪x, y⟫ := by
rw [inner_smul_right, Algebra.smul_def]
/-- The inner product as a sesquilinear form.
Note that in the case `𝕜 = ℝ` this is a bilinear form. -/
@[simps!]
def sesqFormOfInner : E →ₗ[𝕜] E →ₗ⋆[𝕜] 𝕜 :=
LinearMap.mk₂'ₛₗ (RingHom.id 𝕜) (starRingEnd _) (fun x y => ⟪y, x⟫)
(fun _x _y _z => inner_add_right _ _ _) (fun _r _x _y => inner_smul_right _ _ _)
(fun _x _y _z => inner_add_left _ _ _) fun _r _x _y => inner_smul_left _ _ _
/-- The real inner product as a bilinear form.
Note that unlike `sesqFormOfInner`, this does not reverse the order of the arguments. -/
@[simps!]
def bilinFormOfRealInner : BilinForm ℝ F := sesqFormOfInner.flip
/-- An inner product with a sum on the left. -/
theorem sum_inner {ι : Type*} (s : Finset ι) (f : ι → E) (x : E) :
⟪∑ i ∈ s, f i, x⟫ = ∑ i ∈ s, ⟪f i, x⟫ :=
map_sum (sesqFormOfInner (𝕜 := 𝕜) (E := E) x) _ _
/-- An inner product with a sum on the right. -/
theorem inner_sum {ι : Type*} (s : Finset ι) (f : ι → E) (x : E) :
⟪x, ∑ i ∈ s, f i⟫ = ∑ i ∈ s, ⟪x, f i⟫ :=
map_sum (LinearMap.flip sesqFormOfInner x) _ _
/-- An inner product with a sum on the left, `Finsupp` version. -/
protected theorem Finsupp.sum_inner {ι : Type*} (l : ι →₀ 𝕜) (v : ι → E) (x : E) :
⟪l.sum fun (i : ι) (a : 𝕜) => a • v i, x⟫ = l.sum fun (i : ι) (a : 𝕜) => conj a • ⟪v i, x⟫ := by
convert sum_inner (𝕜 := 𝕜) l.support (fun a => l a • v a) x
simp only [inner_smul_left, Finsupp.sum, smul_eq_mul]
/-- An inner product with a sum on the right, `Finsupp` version. -/
protected theorem Finsupp.inner_sum {ι : Type*} (l : ι →₀ 𝕜) (v : ι → E) (x : E) :
⟪x, l.sum fun (i : ι) (a : 𝕜) => a • v i⟫ = l.sum fun (i : ι) (a : 𝕜) => a • ⟪x, v i⟫ := by
convert inner_sum (𝕜 := 𝕜) l.support (fun a => l a • v a) x
simp only [inner_smul_right, Finsupp.sum, smul_eq_mul]
protected theorem DFinsupp.sum_inner {ι : Type*} [DecidableEq ι] {α : ι → Type*}
[∀ i, AddZeroClass (α i)] [∀ (i) (x : α i), Decidable (x ≠ 0)] (f : ∀ i, α i → E)
(l : Π₀ i, α i) (x : E) : ⟪l.sum f, x⟫ = l.sum fun i a => ⟪f i a, x⟫ := by
simp +contextual only [DFinsupp.sum, sum_inner, smul_eq_mul]
protected theorem DFinsupp.inner_sum {ι : Type*} [DecidableEq ι] {α : ι → Type*}
[∀ i, AddZeroClass (α i)] [∀ (i) (x : α i), Decidable (x ≠ 0)] (f : ∀ i, α i → E)
(l : Π₀ i, α i) (x : E) : ⟪x, l.sum f⟫ = l.sum fun i a => ⟪x, f i a⟫ := by
simp +contextual only [DFinsupp.sum, inner_sum, smul_eq_mul]
@[simp]
theorem inner_zero_left (x : E) : ⟪0, x⟫ = 0 := by
rw [← zero_smul 𝕜 (0 : E), inner_smul_left, RingHom.map_zero, zero_mul]
theorem inner_re_zero_left (x : E) : re ⟪0, x⟫ = 0 := by
simp only [inner_zero_left, AddMonoidHom.map_zero]
@[simp]
theorem inner_zero_right (x : E) : ⟪x, 0⟫ = 0 := by
rw [← inner_conj_symm, inner_zero_left, RingHom.map_zero]
theorem inner_re_zero_right (x : E) : re ⟪x, 0⟫ = 0 := by
simp only [inner_zero_right, AddMonoidHom.map_zero]
theorem inner_self_nonneg {x : E} : 0 ≤ re ⟪x, x⟫ :=
PreInnerProductSpace.toCore.re_inner_nonneg x
theorem real_inner_self_nonneg {x : F} : 0 ≤ ⟪x, x⟫_ℝ :=
@inner_self_nonneg ℝ F _ _ _ x
@[simp]
theorem inner_self_ofReal_re (x : E) : (re ⟪x, x⟫ : 𝕜) = ⟪x, x⟫ :=
((RCLike.is_real_TFAE (⟪x, x⟫ : 𝕜)).out 2 3).2 (inner_self_im (𝕜 := 𝕜) x)
theorem inner_self_eq_norm_sq_to_K (x : E) : ⟪x, x⟫ = (‖x‖ : 𝕜) ^ 2 := by
rw [← inner_self_ofReal_re, ← norm_sq_eq_re_inner, ofReal_pow]
theorem inner_self_re_eq_norm (x : E) : re ⟪x, x⟫ = ‖⟪x, x⟫‖ := by
conv_rhs => rw [← inner_self_ofReal_re]
symm
exact norm_of_nonneg inner_self_nonneg
theorem inner_self_ofReal_norm (x : E) : (‖⟪x, x⟫‖ : 𝕜) = ⟪x, x⟫ := by
rw [← inner_self_re_eq_norm]
exact inner_self_ofReal_re _
theorem real_inner_self_abs (x : F) : |⟪x, x⟫_ℝ| = ⟪x, x⟫_ℝ :=
@inner_self_ofReal_norm ℝ F _ _ _ x
theorem norm_inner_symm (x y : E) : ‖⟪x, y⟫‖ = ‖⟪y, x⟫‖ := by rw [← inner_conj_symm, norm_conj]
@[simp]
theorem inner_neg_left (x y : E) : ⟪-x, y⟫ = -⟪x, y⟫ := by
rw [← neg_one_smul 𝕜 x, inner_smul_left]
simp
@[simp]
theorem inner_neg_right (x y : E) : ⟪x, -y⟫ = -⟪x, y⟫ := by
rw [← inner_conj_symm, inner_neg_left]; simp only [RingHom.map_neg, inner_conj_symm]
theorem inner_neg_neg (x y : E) : ⟪-x, -y⟫ = ⟪x, y⟫ := by simp
theorem inner_self_conj (x : E) : ⟪x, x⟫† = ⟪x, x⟫ := inner_conj_symm _ _
theorem inner_sub_left (x y z : E) : ⟪x - y, z⟫ = ⟪x, z⟫ - ⟪y, z⟫ := by
simp [sub_eq_add_neg, inner_add_left]
theorem inner_sub_right (x y z : E) : ⟪x, y - z⟫ = ⟪x, y⟫ - ⟪x, z⟫ := by
simp [sub_eq_add_neg, inner_add_right]
theorem inner_mul_symm_re_eq_norm (x y : E) : re (⟪x, y⟫ * ⟪y, x⟫) = ‖⟪x, y⟫ * ⟪y, x⟫‖ := by
rw [← inner_conj_symm, mul_comm]
exact re_eq_norm_of_mul_conj (inner y x)
/-- Expand `⟪x + y, x + y⟫` -/
theorem inner_add_add_self (x y : E) : ⟪x + y, x + y⟫ = ⟪x, x⟫ + ⟪x, y⟫ + ⟪y, x⟫ + ⟪y, y⟫ := by
simp only [inner_add_left, inner_add_right]; ring
/-- Expand `⟪x + y, x + y⟫_ℝ` -/
theorem real_inner_add_add_self (x y : F) :
⟪x + y, x + y⟫_ℝ = ⟪x, x⟫_ℝ + 2 * ⟪x, y⟫_ℝ + ⟪y, y⟫_ℝ := by
have : ⟪y, x⟫_ℝ = ⟪x, y⟫_ℝ := by rw [← inner_conj_symm]; rfl
simp only [inner_add_add_self, this, add_left_inj]
ring
-- Expand `⟪x - y, x - y⟫`
theorem inner_sub_sub_self (x y : E) : ⟪x - y, x - y⟫ = ⟪x, x⟫ - ⟪x, y⟫ - ⟪y, x⟫ + ⟪y, y⟫ := by
simp only [inner_sub_left, inner_sub_right]; ring
/-- Expand `⟪x - y, x - y⟫_ℝ` -/
theorem real_inner_sub_sub_self (x y : F) :
⟪x - y, x - y⟫_ℝ = ⟪x, x⟫_ℝ - 2 * ⟪x, y⟫_ℝ + ⟪y, y⟫_ℝ := by
have : ⟪y, x⟫_ℝ = ⟪x, y⟫_ℝ := by rw [← inner_conj_symm]; rfl
simp only [inner_sub_sub_self, this, add_left_inj]
ring
/-- Parallelogram law -/
theorem parallelogram_law {x y : E} : ⟪x + y, x + y⟫ + ⟪x - y, x - y⟫ = 2 * (⟪x, x⟫ + ⟪y, y⟫) := by
simp only [inner_add_add_self, inner_sub_sub_self]
ring
/-- **Cauchy–Schwarz inequality**. -/
theorem inner_mul_inner_self_le (x y : E) : ‖⟪x, y⟫‖ * ‖⟪y, x⟫‖ ≤ re ⟪x, x⟫ * re ⟪y, y⟫ :=
letI cd : PreInnerProductSpace.Core 𝕜 E := PreInnerProductSpace.toCore
InnerProductSpace.Core.inner_mul_inner_self_le x y
/-- Cauchy–Schwarz inequality for real inner products. -/
theorem real_inner_mul_inner_self_le (x y : F) : ⟪x, y⟫_ℝ * ⟪x, y⟫_ℝ ≤ ⟪x, x⟫_ℝ * ⟪y, y⟫_ℝ :=
calc
⟪x, y⟫_ℝ * ⟪x, y⟫_ℝ ≤ ‖⟪x, y⟫_ℝ‖ * ‖⟪y, x⟫_ℝ‖ := by
rw [real_inner_comm y, ← norm_mul]
exact le_abs_self _
_ ≤ ⟪x, x⟫_ℝ * ⟪y, y⟫_ℝ := @inner_mul_inner_self_le ℝ _ _ _ _ x y
end BasicProperties_Seminormed
section BasicProperties
variable [NormedAddCommGroup E] [InnerProductSpace 𝕜 E]
variable [NormedAddCommGroup F] [InnerProductSpace ℝ F]
local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y
export InnerProductSpace (norm_sq_eq_re_inner)
@[simp]
theorem inner_self_eq_zero {x : E} : ⟪x, x⟫ = 0 ↔ x = 0 := by
rw [inner_self_eq_norm_sq_to_K, sq_eq_zero_iff, ofReal_eq_zero, norm_eq_zero]
theorem inner_self_ne_zero {x : E} : ⟪x, x⟫ ≠ 0 ↔ x ≠ 0 :=
inner_self_eq_zero.not
variable (𝕜)
theorem ext_inner_left {x y : E} (h : ∀ v, ⟪v, x⟫ = ⟪v, y⟫) : x = y := by
rw [← sub_eq_zero, ← @inner_self_eq_zero 𝕜, inner_sub_right, sub_eq_zero, h (x - y)]
theorem ext_inner_right {x y : E} (h : ∀ v, ⟪x, v⟫ = ⟪y, v⟫) : x = y := by
rw [← sub_eq_zero, ← @inner_self_eq_zero 𝕜, inner_sub_left, sub_eq_zero, h (x - y)]
variable {𝕜}
@[simp]
theorem re_inner_self_nonpos {x : E} : re ⟪x, x⟫ ≤ 0 ↔ x = 0 := by
rw [← norm_sq_eq_re_inner, (sq_nonneg _).le_iff_eq, sq_eq_zero_iff, norm_eq_zero]
@[simp]
lemma re_inner_self_pos {x : E} : 0 < re ⟪x, x⟫ ↔ x ≠ 0 := by
simpa [-re_inner_self_nonpos] using re_inner_self_nonpos (𝕜 := 𝕜) (x := x).not
@[deprecated (since := "2025-04-22")] alias inner_self_nonpos := re_inner_self_nonpos
@[deprecated (since := "2025-04-22")] alias inner_self_pos := re_inner_self_pos
open scoped InnerProductSpace in
theorem real_inner_self_nonpos {x : F} : ⟪x, x⟫_ℝ ≤ 0 ↔ x = 0 := re_inner_self_nonpos (𝕜 := ℝ)
open scoped InnerProductSpace in
theorem real_inner_self_pos {x : F} : 0 < ⟪x, x⟫_ℝ ↔ x ≠ 0 := re_inner_self_pos (𝕜 := ℝ)
/-- A family of vectors is linearly independent if they are nonzero
and orthogonal. -/
theorem linearIndependent_of_ne_zero_of_inner_eq_zero {ι : Type*} {v : ι → E} (hz : ∀ i, v i ≠ 0)
(ho : Pairwise fun i j => ⟪v i, v j⟫ = 0) : LinearIndependent 𝕜 v := by
rw [linearIndependent_iff']
intro s g hg i hi
have h' : g i * inner (v i) (v i) = inner (v i) (∑ j ∈ s, g j • v j) := by
rw [inner_sum]
symm
convert Finset.sum_eq_single (M := 𝕜) i ?_ ?_
· rw [inner_smul_right]
· intro j _hj hji
rw [inner_smul_right, ho hji.symm, mul_zero]
· exact fun h => False.elim (h hi)
simpa [hg, hz] using h'
end BasicProperties
section Norm_Seminormed
open scoped InnerProductSpace
variable [SeminormedAddCommGroup E] [InnerProductSpace 𝕜 E]
variable [SeminormedAddCommGroup F] [InnerProductSpace ℝ F]
local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y
local notation "IK" => @RCLike.I 𝕜 _
theorem norm_eq_sqrt_re_inner (x : E) : ‖x‖ = √(re ⟪x, x⟫) :=
calc
‖x‖ = √(‖x‖ ^ 2) := (sqrt_sq (norm_nonneg _)).symm
_ = √(re ⟪x, x⟫) := congr_arg _ (norm_sq_eq_re_inner _)
@[deprecated (since := "2025-04-22")] alias norm_eq_sqrt_inner := norm_eq_sqrt_re_inner
theorem norm_eq_sqrt_real_inner (x : F) : ‖x‖ = √⟪x, x⟫_ℝ :=
@norm_eq_sqrt_re_inner ℝ _ _ _ _ x
theorem inner_self_eq_norm_mul_norm (x : E) : re ⟪x, x⟫ = ‖x‖ * ‖x‖ := by
rw [@norm_eq_sqrt_re_inner 𝕜, ← sqrt_mul inner_self_nonneg (re ⟪x, x⟫),
sqrt_mul_self inner_self_nonneg]
theorem inner_self_eq_norm_sq (x : E) : re ⟪x, x⟫ = ‖x‖ ^ 2 := by
rw [pow_two, inner_self_eq_norm_mul_norm]
theorem real_inner_self_eq_norm_mul_norm (x : F) : ⟪x, x⟫_ℝ = ‖x‖ * ‖x‖ := by
have h := @inner_self_eq_norm_mul_norm ℝ F _ _ _ x
simpa using h
theorem real_inner_self_eq_norm_sq (x : F) : ⟪x, x⟫_ℝ = ‖x‖ ^ 2 := by
rw [pow_two, real_inner_self_eq_norm_mul_norm]
/-- Expand the square -/
theorem norm_add_sq (x y : E) : ‖x + y‖ ^ 2 = ‖x‖ ^ 2 + 2 * re ⟪x, y⟫ + ‖y‖ ^ 2 := by
repeat' rw [sq (M := ℝ), ← @inner_self_eq_norm_mul_norm 𝕜]
rw [inner_add_add_self, two_mul]
simp only [add_assoc, add_left_inj, add_right_inj, AddMonoidHom.map_add]
rw [← inner_conj_symm, conj_re]
alias norm_add_pow_two := norm_add_sq
/-- Expand the square -/
theorem norm_add_sq_real (x y : F) : ‖x + y‖ ^ 2 = ‖x‖ ^ 2 + 2 * ⟪x, y⟫_ℝ + ‖y‖ ^ 2 := by
have h := @norm_add_sq ℝ _ _ _ _ x y
simpa using h
alias norm_add_pow_two_real := norm_add_sq_real
/-- Expand the square -/
theorem norm_add_mul_self (x y : E) :
‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + 2 * re ⟪x, y⟫ + ‖y‖ * ‖y‖ := by
repeat' rw [← sq (M := ℝ)]
exact norm_add_sq _ _
/-- Expand the square -/
theorem norm_add_mul_self_real (x y : F) :
‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + 2 * ⟪x, y⟫_ℝ + ‖y‖ * ‖y‖ := by
have h := @norm_add_mul_self ℝ _ _ _ _ x y
simpa using h
/-- Expand the square -/
theorem norm_sub_sq (x y : E) : ‖x - y‖ ^ 2 = ‖x‖ ^ 2 - 2 * re ⟪x, y⟫ + ‖y‖ ^ 2 := by
rw [sub_eq_add_neg, @norm_add_sq 𝕜 _ _ _ _ x (-y), norm_neg, inner_neg_right, map_neg, mul_neg,
sub_eq_add_neg]
alias norm_sub_pow_two := norm_sub_sq
/-- Expand the square -/
theorem norm_sub_sq_real (x y : F) : ‖x - y‖ ^ 2 = ‖x‖ ^ 2 - 2 * ⟪x, y⟫_ℝ + ‖y‖ ^ 2 :=
@norm_sub_sq ℝ _ _ _ _ _ _
alias norm_sub_pow_two_real := norm_sub_sq_real
/-- Expand the square -/
theorem norm_sub_mul_self (x y : E) :
‖x - y‖ * ‖x - y‖ = ‖x‖ * ‖x‖ - 2 * re ⟪x, y⟫ + ‖y‖ * ‖y‖ := by
repeat' rw [← sq (M := ℝ)]
exact norm_sub_sq _ _
/-- Expand the square -/
theorem norm_sub_mul_self_real (x y : F) :
‖x - y‖ * ‖x - y‖ = ‖x‖ * ‖x‖ - 2 * ⟪x, y⟫_ℝ + ‖y‖ * ‖y‖ := by
have h := @norm_sub_mul_self ℝ _ _ _ _ x y
simpa using h
/-- Cauchy–Schwarz inequality with norm -/
theorem norm_inner_le_norm (x y : E) : ‖⟪x, y⟫‖ ≤ ‖x‖ * ‖y‖ := by
rw [norm_eq_sqrt_re_inner (𝕜 := 𝕜) x, norm_eq_sqrt_re_inner (𝕜 := 𝕜) y]
letI : PreInnerProductSpace.Core 𝕜 E := PreInnerProductSpace.toCore
exact InnerProductSpace.Core.norm_inner_le_norm x y
theorem nnnorm_inner_le_nnnorm (x y : E) : ‖⟪x, y⟫‖₊ ≤ ‖x‖₊ * ‖y‖₊ :=
norm_inner_le_norm x y
theorem re_inner_le_norm (x y : E) : re ⟪x, y⟫ ≤ ‖x‖ * ‖y‖ :=
le_trans (re_le_norm (inner x y)) (norm_inner_le_norm x y)
/-- Cauchy–Schwarz inequality with norm -/
theorem abs_real_inner_le_norm (x y : F) : |⟪x, y⟫_ℝ| ≤ ‖x‖ * ‖y‖ :=
(Real.norm_eq_abs _).ge.trans (norm_inner_le_norm x y)
/-- Cauchy–Schwarz inequality with norm -/
theorem real_inner_le_norm (x y : F) : ⟪x, y⟫_ℝ ≤ ‖x‖ * ‖y‖ :=
le_trans (le_abs_self _) (abs_real_inner_le_norm _ _)
lemma inner_eq_zero_of_left {x : E} (y : E) (h : ‖x‖ = 0) : ⟪x, y⟫_𝕜 = 0 := by
rw [← norm_eq_zero]
refine le_antisymm ?_ (by positivity)
exact norm_inner_le_norm _ _ |>.trans <| by simp [h]
lemma inner_eq_zero_of_right (x : E) {y : E} (h : ‖y‖ = 0) : ⟪x, y⟫_𝕜 = 0 := by
rw [inner_eq_zero_symm, inner_eq_zero_of_left _ h]
variable (𝕜)
include 𝕜 in
theorem parallelogram_law_with_norm (x y : E) :
‖x + y‖ * ‖x + y‖ + ‖x - y‖ * ‖x - y‖ = 2 * (‖x‖ * ‖x‖ + ‖y‖ * ‖y‖) := by
simp only [← @inner_self_eq_norm_mul_norm 𝕜]
rw [← re.map_add, parallelogram_law, two_mul, two_mul]
simp only [re.map_add]
include 𝕜 in
theorem parallelogram_law_with_nnnorm (x y : E) :
‖x + y‖₊ * ‖x + y‖₊ + ‖x - y‖₊ * ‖x - y‖₊ = 2 * (‖x‖₊ * ‖x‖₊ + ‖y‖₊ * ‖y‖₊) :=
Subtype.ext <| parallelogram_law_with_norm 𝕜 x y
variable {𝕜}
/-- Polarization identity: The real part of the inner product, in terms of the norm. -/
theorem re_inner_eq_norm_add_mul_self_sub_norm_mul_self_sub_norm_mul_self_div_two (x y : E) :
re ⟪x, y⟫ = (‖x + y‖ * ‖x + y‖ - ‖x‖ * ‖x‖ - ‖y‖ * ‖y‖) / 2 := by
rw [@norm_add_mul_self 𝕜]
ring
/-- Polarization identity: The real part of the inner product, in terms of the norm. -/
theorem re_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two (x y : E) :
re ⟪x, y⟫ = (‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ - ‖x - y‖ * ‖x - y‖) / 2 := by
rw [@norm_sub_mul_self 𝕜]
ring
/-- Polarization identity: The real part of the inner product, in terms of the norm. -/
theorem re_inner_eq_norm_add_mul_self_sub_norm_sub_mul_self_div_four (x y : E) :
re ⟪x, y⟫ = (‖x + y‖ * ‖x + y‖ - ‖x - y‖ * ‖x - y‖) / 4 := by
rw [@norm_add_mul_self 𝕜, @norm_sub_mul_self 𝕜]
ring
/-- Polarization identity: The imaginary part of the inner product, in terms of the norm. -/
theorem im_inner_eq_norm_sub_i_smul_mul_self_sub_norm_add_i_smul_mul_self_div_four (x y : E) :
im ⟪x, y⟫ = (‖x - IK • y‖ * ‖x - IK • y‖ - ‖x + IK • y‖ * ‖x + IK • y‖) / 4 := by
simp only [@norm_add_mul_self 𝕜, @norm_sub_mul_self 𝕜, inner_smul_right, I_mul_re]
ring
/-- Polarization identity: The inner product, in terms of the norm. -/
theorem inner_eq_sum_norm_sq_div_four (x y : E) :
⟪x, y⟫ = ((‖x + y‖ : 𝕜) ^ 2 - (‖x - y‖ : 𝕜) ^ 2 +
((‖x - IK • y‖ : 𝕜) ^ 2 - (‖x + IK • y‖ : 𝕜) ^ 2) * IK) / 4 := by
rw [← re_add_im ⟪x, y⟫, re_inner_eq_norm_add_mul_self_sub_norm_sub_mul_self_div_four,
im_inner_eq_norm_sub_i_smul_mul_self_sub_norm_add_i_smul_mul_self_div_four]
push_cast
simp only [sq, ← mul_div_right_comm, ← add_div]
/-- Polarization identity: The real inner product, in terms of the norm. -/
theorem real_inner_eq_norm_add_mul_self_sub_norm_mul_self_sub_norm_mul_self_div_two (x y : F) :
⟪x, y⟫_ℝ = (‖x + y‖ * ‖x + y‖ - ‖x‖ * ‖x‖ - ‖y‖ * ‖y‖) / 2 :=
re_to_real.symm.trans <|
re_inner_eq_norm_add_mul_self_sub_norm_mul_self_sub_norm_mul_self_div_two x y
/-- Polarization identity: The real inner product, in terms of the norm. -/
theorem real_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two (x y : F) :
⟪x, y⟫_ℝ = (‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ - ‖x - y‖ * ‖x - y‖) / 2 :=
re_to_real.symm.trans <|
re_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two x y
/-- Pythagorean theorem, if-and-only-if vector inner product form. -/
theorem norm_add_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero (x y : F) :
‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ ↔ ⟪x, y⟫_ℝ = 0 := by
rw [@norm_add_mul_self ℝ, add_right_cancel_iff, add_eq_left, mul_eq_zero]
norm_num
/-- Pythagorean theorem, if-and-if vector inner product form using square roots. -/
theorem norm_add_eq_sqrt_iff_real_inner_eq_zero {x y : F} :
‖x + y‖ = √(‖x‖ * ‖x‖ + ‖y‖ * ‖y‖) ↔ ⟪x, y⟫_ℝ = 0 := by
rw [← norm_add_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero, eq_comm, sqrt_eq_iff_mul_self_eq,
eq_comm] <;> positivity
/-- Pythagorean theorem, vector inner product form. -/
theorem norm_add_sq_eq_norm_sq_add_norm_sq_of_inner_eq_zero (x y : E) (h : ⟪x, y⟫ = 0) :
‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ := by
rw [@norm_add_mul_self 𝕜, add_right_cancel_iff, add_eq_left, mul_eq_zero]
apply Or.inr
simp only [h, zero_re']
/-- Pythagorean theorem, vector inner product form. -/
theorem norm_add_sq_eq_norm_sq_add_norm_sq_real {x y : F} (h : ⟪x, y⟫_ℝ = 0) :
‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ :=
(norm_add_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero x y).2 h
/-- Pythagorean theorem, subtracting vectors, if-and-only-if vector
inner product form. -/
theorem norm_sub_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero (x y : F) :
‖x - y‖ * ‖x - y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ ↔ ⟪x, y⟫_ℝ = 0 := by
rw [@norm_sub_mul_self ℝ, add_right_cancel_iff, sub_eq_add_neg, add_eq_left, neg_eq_zero,
mul_eq_zero]
norm_num
/-- Pythagorean theorem, subtracting vectors, if-and-if vector inner product form using square
roots. -/
theorem norm_sub_eq_sqrt_iff_real_inner_eq_zero {x y : F} :
‖x - y‖ = √(‖x‖ * ‖x‖ + ‖y‖ * ‖y‖) ↔ ⟪x, y⟫_ℝ = 0 := by
rw [← norm_sub_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero, eq_comm, sqrt_eq_iff_mul_self_eq,
eq_comm] <;> positivity
/-- Pythagorean theorem, subtracting vectors, vector inner product
form. -/
theorem norm_sub_sq_eq_norm_sq_add_norm_sq_real {x y : F} (h : ⟪x, y⟫_ℝ = 0) :
‖x - y‖ * ‖x - y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ :=
(norm_sub_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero x y).2 h
/-- The sum and difference of two vectors are orthogonal if and only
if they have the same norm. -/
theorem real_inner_add_sub_eq_zero_iff (x y : F) : ⟪x + y, x - y⟫_ℝ = 0 ↔ ‖x‖ = ‖y‖ := by
conv_rhs => rw [← mul_self_inj_of_nonneg (norm_nonneg _) (norm_nonneg _)]
simp only [← @inner_self_eq_norm_mul_norm ℝ, inner_add_left, inner_sub_right, real_inner_comm y x,
sub_eq_zero, re_to_real]
constructor
· intro h
rw [add_comm] at h
linarith
· intro h
linarith
/-- Given two orthogonal vectors, their sum and difference have equal norms. -/
theorem norm_sub_eq_norm_add {v w : E} (h : ⟪v, w⟫ = 0) : ‖w - v‖ = ‖w + v‖ := by
rw [← mul_self_inj_of_nonneg (norm_nonneg _) (norm_nonneg _)]
simp only [h, ← @inner_self_eq_norm_mul_norm 𝕜, sub_neg_eq_add, sub_zero, map_sub, zero_re',
zero_sub, add_zero, map_add, inner_add_right, inner_sub_left, inner_sub_right, inner_re_symm,
zero_add]
/-- The real inner product of two vectors, divided by the product of their
norms, has absolute value at most 1. -/
theorem abs_real_inner_div_norm_mul_norm_le_one (x y : F) : |⟪x, y⟫_ℝ / (‖x‖ * ‖y‖)| ≤ 1 := by
rw [abs_div, abs_mul, abs_norm, abs_norm]
exact div_le_one_of_le₀ (abs_real_inner_le_norm x y) (by positivity)
/-- The inner product of a vector with a multiple of itself. -/
theorem real_inner_smul_self_left (x : F) (r : ℝ) : ⟪r • x, x⟫_ℝ = r * (‖x‖ * ‖x‖) := by
rw [real_inner_smul_left, ← real_inner_self_eq_norm_mul_norm]
/-- The inner product of a vector with a multiple of itself. -/
theorem real_inner_smul_self_right (x : F) (r : ℝ) : ⟪x, r • x⟫_ℝ = r * (‖x‖ * ‖x‖) := by
rw [inner_smul_right, ← real_inner_self_eq_norm_mul_norm]
/-- The inner product of two weighted sums, where the weights in each
sum add to 0, in terms of the norms of pairwise differences. -/
theorem inner_sum_smul_sum_smul_of_sum_eq_zero {ι₁ : Type*} {s₁ : Finset ι₁} {w₁ : ι₁ → ℝ}
(v₁ : ι₁ → F) (h₁ : ∑ i ∈ s₁, w₁ i = 0) {ι₂ : Type*} {s₂ : Finset ι₂} {w₂ : ι₂ → ℝ}
(v₂ : ι₂ → F) (h₂ : ∑ i ∈ s₂, w₂ i = 0) :
⟪∑ i₁ ∈ s₁, w₁ i₁ • v₁ i₁, ∑ i₂ ∈ s₂, w₂ i₂ • v₂ i₂⟫_ℝ =
(-∑ i₁ ∈ s₁, ∑ i₂ ∈ s₂, w₁ i₁ * w₂ i₂ * (‖v₁ i₁ - v₂ i₂‖ * ‖v₁ i₁ - v₂ i₂‖)) / 2 := by
simp_rw [sum_inner, inner_sum, real_inner_smul_left, real_inner_smul_right,
real_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two, ← div_sub_div_same,
← div_add_div_same, mul_sub_left_distrib, left_distrib, Finset.sum_sub_distrib,
Finset.sum_add_distrib, ← Finset.mul_sum, ← Finset.sum_mul, h₁, h₂, zero_mul,
mul_zero, Finset.sum_const_zero, zero_add, zero_sub, Finset.mul_sum, neg_div,
Finset.sum_div, mul_div_assoc, mul_assoc]
end Norm_Seminormed
section Norm
open scoped InnerProductSpace
variable [NormedAddCommGroup E] [InnerProductSpace 𝕜 E]
variable [NormedAddCommGroup F] [InnerProductSpace ℝ F]
variable {ι : Type*}
local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y
/-- Formula for the distance between the images of two nonzero points under an inversion with center
zero. See also `EuclideanGeometry.dist_inversion_inversion` for inversions around a general
point. -/
theorem dist_div_norm_sq_smul {x y : F} (hx : x ≠ 0) (hy : y ≠ 0) (R : ℝ) :
dist ((R / ‖x‖) ^ 2 • x) ((R / ‖y‖) ^ 2 • y) = R ^ 2 / (‖x‖ * ‖y‖) * dist x y :=
calc
dist ((R / ‖x‖) ^ 2 • x) ((R / ‖y‖) ^ 2 • y) =
| √(‖(R / ‖x‖) ^ 2 • x - (R / ‖y‖) ^ 2 • y‖ ^ 2) := by
rw [dist_eq_norm, sqrt_sq (norm_nonneg _)]
_ = √((R ^ 2 / (‖x‖ * ‖y‖)) ^ 2 * ‖x - y‖ ^ 2) :=
| Mathlib/Analysis/InnerProductSpace/Basic.lean | 620 | 622 |
/-
Copyright (c) 2017 Kevin Buzzard. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Kevin Buzzard, Mario Carneiro
-/
import Mathlib.Algebra.Ring.CharZero
import Mathlib.Algebra.Star.Basic
import Mathlib.Data.Real.Basic
import Mathlib.Order.Interval.Set.UnorderedInterval
import Mathlib.Tactic.Ring
/-!
# The complex numbers
The complex numbers are modelled as ℝ^2 in the obvious way and it is shown that they form a field
of characteristic zero. The result that the complex numbers are algebraically closed, see
`FieldTheory.AlgebraicClosure`.
-/
assert_not_exists Multiset Algebra
open Set Function
/-! ### Definition and basic arithmetic -/
/-- Complex numbers consist of two `Real`s: a real part `re` and an imaginary part `im`. -/
structure Complex : Type where
/-- The real part of a complex number. -/
re : ℝ
/-- The imaginary part of a complex number. -/
im : ℝ
@[inherit_doc] notation "ℂ" => Complex
namespace Complex
open ComplexConjugate
noncomputable instance : DecidableEq ℂ :=
Classical.decEq _
/-- The equivalence between the complex numbers and `ℝ × ℝ`. -/
@[simps apply]
def equivRealProd : ℂ ≃ ℝ × ℝ where
toFun z := ⟨z.re, z.im⟩
invFun p := ⟨p.1, p.2⟩
left_inv := fun ⟨_, _⟩ => rfl
right_inv := fun ⟨_, _⟩ => rfl
@[simp]
theorem eta : ∀ z : ℂ, Complex.mk z.re z.im = z
| ⟨_, _⟩ => rfl
-- We only mark this lemma with `ext` *locally* to avoid it applying whenever terms of `ℂ` appear.
theorem ext : ∀ {z w : ℂ}, z.re = w.re → z.im = w.im → z = w
| ⟨_, _⟩, ⟨_, _⟩, rfl, rfl => rfl
attribute [local ext] Complex.ext
lemma «forall» {p : ℂ → Prop} : (∀ x, p x) ↔ ∀ a b, p ⟨a, b⟩ := by aesop
lemma «exists» {p : ℂ → Prop} : (∃ x, p x) ↔ ∃ a b, p ⟨a, b⟩ := by aesop
theorem re_surjective : Surjective re := fun x => ⟨⟨x, 0⟩, rfl⟩
theorem im_surjective : Surjective im := fun y => ⟨⟨0, y⟩, rfl⟩
@[simp]
theorem range_re : range re = univ :=
re_surjective.range_eq
@[simp]
theorem range_im : range im = univ :=
im_surjective.range_eq
/-- The natural inclusion of the real numbers into the complex numbers. -/
@[coe]
def ofReal (r : ℝ) : ℂ :=
⟨r, 0⟩
instance : Coe ℝ ℂ :=
⟨ofReal⟩
@[simp, norm_cast]
theorem ofReal_re (r : ℝ) : Complex.re (r : ℂ) = r :=
rfl
@[simp, norm_cast]
theorem ofReal_im (r : ℝ) : (r : ℂ).im = 0 :=
rfl
theorem ofReal_def (r : ℝ) : (r : ℂ) = ⟨r, 0⟩ :=
rfl
@[simp, norm_cast]
theorem ofReal_inj {z w : ℝ} : (z : ℂ) = w ↔ z = w :=
⟨congrArg re, by apply congrArg⟩
theorem ofReal_injective : Function.Injective ((↑) : ℝ → ℂ) := fun _ _ => congrArg re
instance canLift : CanLift ℂ ℝ (↑) fun z => z.im = 0 where
prf z hz := ⟨z.re, ext rfl hz.symm⟩
/-- The product of a set on the real axis and a set on the imaginary axis of the complex plane,
denoted by `s ×ℂ t`. -/
def reProdIm (s t : Set ℝ) : Set ℂ :=
re ⁻¹' s ∩ im ⁻¹' t
@[deprecated (since := "2024-12-03")] protected alias Set.reProdIm := reProdIm
@[inherit_doc]
infixl:72 " ×ℂ " => reProdIm
theorem mem_reProdIm {z : ℂ} {s t : Set ℝ} : z ∈ s ×ℂ t ↔ z.re ∈ s ∧ z.im ∈ t :=
Iff.rfl
instance : Zero ℂ :=
⟨(0 : ℝ)⟩
instance : Inhabited ℂ :=
⟨0⟩
@[simp]
theorem zero_re : (0 : ℂ).re = 0 :=
rfl
@[simp]
theorem zero_im : (0 : ℂ).im = 0 :=
rfl
@[simp, norm_cast]
theorem ofReal_zero : ((0 : ℝ) : ℂ) = 0 :=
rfl
@[simp]
theorem ofReal_eq_zero {z : ℝ} : (z : ℂ) = 0 ↔ z = 0 :=
ofReal_inj
theorem ofReal_ne_zero {z : ℝ} : (z : ℂ) ≠ 0 ↔ z ≠ 0 :=
not_congr ofReal_eq_zero
instance : One ℂ :=
⟨(1 : ℝ)⟩
@[simp]
theorem one_re : (1 : ℂ).re = 1 :=
rfl
@[simp]
theorem one_im : (1 : ℂ).im = 0 :=
rfl
@[simp, norm_cast]
theorem ofReal_one : ((1 : ℝ) : ℂ) = 1 :=
rfl
@[simp]
theorem ofReal_eq_one {z : ℝ} : (z : ℂ) = 1 ↔ z = 1 :=
ofReal_inj
theorem ofReal_ne_one {z : ℝ} : (z : ℂ) ≠ 1 ↔ z ≠ 1 :=
not_congr ofReal_eq_one
instance : Add ℂ :=
⟨fun z w => ⟨z.re + w.re, z.im + w.im⟩⟩
@[simp]
theorem add_re (z w : ℂ) : (z + w).re = z.re + w.re :=
rfl
@[simp]
theorem add_im (z w : ℂ) : (z + w).im = z.im + w.im :=
rfl
-- replaced by `re_ofNat`
-- replaced by `im_ofNat`
@[simp, norm_cast]
theorem ofReal_add (r s : ℝ) : ((r + s : ℝ) : ℂ) = r + s :=
Complex.ext_iff.2 <| by simp [ofReal]
-- replaced by `Complex.ofReal_ofNat`
instance : Neg ℂ :=
⟨fun z => ⟨-z.re, -z.im⟩⟩
@[simp]
theorem neg_re (z : ℂ) : (-z).re = -z.re :=
rfl
@[simp]
theorem neg_im (z : ℂ) : (-z).im = -z.im :=
rfl
@[simp, norm_cast]
theorem ofReal_neg (r : ℝ) : ((-r : ℝ) : ℂ) = -r :=
Complex.ext_iff.2 <| by simp [ofReal]
instance : Sub ℂ :=
⟨fun z w => ⟨z.re - w.re, z.im - w.im⟩⟩
instance : Mul ℂ :=
⟨fun z w => ⟨z.re * w.re - z.im * w.im, z.re * w.im + z.im * w.re⟩⟩
@[simp]
theorem mul_re (z w : ℂ) : (z * w).re = z.re * w.re - z.im * w.im :=
rfl
@[simp]
theorem mul_im (z w : ℂ) : (z * w).im = z.re * w.im + z.im * w.re :=
rfl
@[simp, norm_cast]
theorem ofReal_mul (r s : ℝ) : ((r * s : ℝ) : ℂ) = r * s :=
Complex.ext_iff.2 <| by simp [ofReal]
theorem re_ofReal_mul (r : ℝ) (z : ℂ) : (r * z).re = r * z.re := by simp [ofReal]
theorem im_ofReal_mul (r : ℝ) (z : ℂ) : (r * z).im = r * z.im := by simp [ofReal]
lemma re_mul_ofReal (z : ℂ) (r : ℝ) : (z * r).re = z.re * r := by simp [ofReal]
lemma im_mul_ofReal (z : ℂ) (r : ℝ) : (z * r).im = z.im * r := by simp [ofReal]
theorem ofReal_mul' (r : ℝ) (z : ℂ) : ↑r * z = ⟨r * z.re, r * z.im⟩ :=
ext (re_ofReal_mul _ _) (im_ofReal_mul _ _)
/-! ### The imaginary unit, `I` -/
/-- The imaginary unit. -/
def I : ℂ :=
⟨0, 1⟩
@[simp]
theorem I_re : I.re = 0 :=
rfl
@[simp]
theorem I_im : I.im = 1 :=
rfl
@[simp]
theorem I_mul_I : I * I = -1 :=
Complex.ext_iff.2 <| by simp
theorem I_mul (z : ℂ) : I * z = ⟨-z.im, z.re⟩ :=
Complex.ext_iff.2 <| by simp
@[simp] lemma I_ne_zero : (I : ℂ) ≠ 0 := mt (congr_arg im) zero_ne_one.symm
theorem mk_eq_add_mul_I (a b : ℝ) : Complex.mk a b = a + b * I :=
Complex.ext_iff.2 <| by simp [ofReal]
@[simp]
theorem re_add_im (z : ℂ) : (z.re : ℂ) + z.im * I = z :=
Complex.ext_iff.2 <| by simp [ofReal]
theorem mul_I_re (z : ℂ) : (z * I).re = -z.im := by simp
theorem mul_I_im (z : ℂ) : (z * I).im = z.re := by simp
theorem I_mul_re (z : ℂ) : (I * z).re = -z.im := by simp
theorem I_mul_im (z : ℂ) : (I * z).im = z.re := by simp
@[simp]
theorem equivRealProd_symm_apply (p : ℝ × ℝ) : equivRealProd.symm p = p.1 + p.2 * I := by
ext <;> simp [Complex.equivRealProd, ofReal]
/-- The natural `AddEquiv` from `ℂ` to `ℝ × ℝ`. -/
@[simps! +simpRhs apply symm_apply_re symm_apply_im]
def equivRealProdAddHom : ℂ ≃+ ℝ × ℝ :=
{ equivRealProd with map_add' := by simp }
theorem equivRealProdAddHom_symm_apply (p : ℝ × ℝ) :
equivRealProdAddHom.symm p = p.1 + p.2 * I := equivRealProd_symm_apply p
/-! ### Commutative ring instance and lemmas -/
/- We use a nonstandard formula for the `ℕ` and `ℤ` actions to make sure there is no
diamond from the other actions they inherit through the `ℝ`-action on `ℂ` and action transitivity
defined in `Data.Complex.Module`. -/
instance : Nontrivial ℂ :=
domain_nontrivial re rfl rfl
namespace SMul
-- The useless `0` multiplication in `smul` is to make sure that
-- `RestrictScalars.module ℝ ℂ ℂ = Complex.module` definitionally.
-- instance made scoped to avoid situations like instance synthesis
-- of `SMul ℂ ℂ` trying to proceed via `SMul ℂ ℝ`.
/-- Scalar multiplication by `R` on `ℝ` extends to `ℂ`. This is used here and in
`Matlib.Data.Complex.Module` to transfer instances from `ℝ` to `ℂ`, but is not
needed outside, so we make it scoped. -/
scoped instance instSMulRealComplex {R : Type*} [SMul R ℝ] : SMul R ℂ where
smul r x := ⟨r • x.re - 0 * x.im, r • x.im + 0 * x.re⟩
end SMul
open scoped SMul
section SMul
variable {R : Type*} [SMul R ℝ]
theorem smul_re (r : R) (z : ℂ) : (r • z).re = r • z.re := by simp [(· • ·), SMul.smul]
theorem smul_im (r : R) (z : ℂ) : (r • z).im = r • z.im := by simp [(· • ·), SMul.smul]
@[simp]
theorem real_smul {x : ℝ} {z : ℂ} : x • z = x * z :=
rfl
end SMul
instance addCommGroup : AddCommGroup ℂ :=
{ zero := (0 : ℂ)
add := (· + ·)
neg := Neg.neg
sub := Sub.sub
nsmul := fun n z => n • z
zsmul := fun n z => n • z
zsmul_zero' := by intros; ext <;> simp [smul_re, smul_im]
nsmul_zero := by intros; ext <;> simp [smul_re, smul_im]
nsmul_succ := by intros; ext <;> simp [smul_re, smul_im] <;> ring
zsmul_succ' := by intros; ext <;> simp [smul_re, smul_im] <;> ring
zsmul_neg' := by intros; ext <;> simp [smul_re, smul_im] <;> ring
add_assoc := by intros; ext <;> simp <;> ring
zero_add := by intros; ext <;> simp
add_zero := by intros; ext <;> simp
add_comm := by intros; ext <;> simp <;> ring
neg_add_cancel := by intros; ext <;> simp }
instance addGroupWithOne : AddGroupWithOne ℂ :=
{ Complex.addCommGroup with
natCast := fun n => ⟨n, 0⟩
natCast_zero := by
ext <;> simp [Nat.cast, AddMonoidWithOne.natCast_zero]
natCast_succ := fun _ => by ext <;> simp [Nat.cast, AddMonoidWithOne.natCast_succ]
intCast := fun n => ⟨n, 0⟩
intCast_ofNat := fun _ => by ext <;> rfl
intCast_negSucc := fun n => by
ext
· simp [AddGroupWithOne.intCast_negSucc]
show -(1 : ℝ) + (-n) = -(↑(n + 1))
simp [Nat.cast_add, add_comm]
· simp [AddGroupWithOne.intCast_negSucc]
show im ⟨n, 0⟩ = 0
rfl
one := 1 }
instance commRing : CommRing ℂ :=
{ addGroupWithOne with
mul := (· * ·)
npow := @npowRec _ ⟨(1 : ℂ)⟩ ⟨(· * ·)⟩
add_comm := by intros; ext <;> simp <;> ring
left_distrib := by intros; ext <;> simp [mul_re, mul_im] <;> ring
right_distrib := by intros; ext <;> simp [mul_re, mul_im] <;> ring
zero_mul := by intros; ext <;> simp
mul_zero := by intros; ext <;> simp
mul_assoc := by intros; ext <;> simp <;> ring
one_mul := by intros; ext <;> simp
mul_one := by intros; ext <;> simp
mul_comm := by intros; ext <;> simp <;> ring }
/-- This shortcut instance ensures we do not find `Ring` via the noncomputable `Complex.field`
instance. -/
instance : Ring ℂ := by infer_instance
/-- This shortcut instance ensures we do not find `CommSemiring` via the noncomputable
`Complex.field` instance. -/
instance : CommSemiring ℂ :=
inferInstance
/-- This shortcut instance ensures we do not find `Semiring` via the noncomputable
`Complex.field` instance. -/
instance : Semiring ℂ :=
inferInstance
/-- The "real part" map, considered as an additive group homomorphism. -/
def reAddGroupHom : ℂ →+ ℝ where
toFun := re
map_zero' := zero_re
map_add' := add_re
@[simp]
theorem coe_reAddGroupHom : (reAddGroupHom : ℂ → ℝ) = re :=
rfl
/-- The "imaginary part" map, considered as an additive group homomorphism. -/
def imAddGroupHom : ℂ →+ ℝ where
toFun := im
map_zero' := zero_im
map_add' := add_im
@[simp]
theorem coe_imAddGroupHom : (imAddGroupHom : ℂ → ℝ) = im :=
rfl
/-! ### Cast lemmas -/
instance instNNRatCast : NNRatCast ℂ where nnratCast q := ofReal q
instance instRatCast : RatCast ℂ where ratCast q := ofReal q
@[simp, norm_cast] lemma ofReal_ofNat (n : ℕ) [n.AtLeastTwo] : ofReal ofNat(n) = ofNat(n) := rfl
@[simp, norm_cast] lemma ofReal_natCast (n : ℕ) : ofReal n = n := rfl
@[simp, norm_cast] lemma ofReal_intCast (n : ℤ) : ofReal n = n := rfl
@[simp, norm_cast] lemma ofReal_nnratCast (q : ℚ≥0) : ofReal q = q := rfl
@[simp, norm_cast] lemma ofReal_ratCast (q : ℚ) : ofReal q = q := rfl
@[simp]
lemma re_ofNat (n : ℕ) [n.AtLeastTwo] : (ofNat(n) : ℂ).re = ofNat(n) := rfl
@[simp] lemma im_ofNat (n : ℕ) [n.AtLeastTwo] : (ofNat(n) : ℂ).im = 0 := rfl
@[simp, norm_cast] lemma natCast_re (n : ℕ) : (n : ℂ).re = n := rfl
@[simp, norm_cast] lemma natCast_im (n : ℕ) : (n : ℂ).im = 0 := rfl
@[simp, norm_cast] lemma intCast_re (n : ℤ) : (n : ℂ).re = n := rfl
@[simp, norm_cast] lemma intCast_im (n : ℤ) : (n : ℂ).im = 0 := rfl
@[simp, norm_cast] lemma re_nnratCast (q : ℚ≥0) : (q : ℂ).re = q := rfl
@[simp, norm_cast] lemma im_nnratCast (q : ℚ≥0) : (q : ℂ).im = 0 := rfl
@[simp, norm_cast] lemma ratCast_re (q : ℚ) : (q : ℂ).re = q := rfl
@[simp, norm_cast] lemma ratCast_im (q : ℚ) : (q : ℂ).im = 0 := rfl
lemma re_nsmul (n : ℕ) (z : ℂ) : (n • z).re = n • z.re := smul_re ..
lemma im_nsmul (n : ℕ) (z : ℂ) : (n • z).im = n • z.im := smul_im ..
lemma re_zsmul (n : ℤ) (z : ℂ) : (n • z).re = n • z.re := smul_re ..
lemma im_zsmul (n : ℤ) (z : ℂ) : (n • z).im = n • z.im := smul_im ..
@[simp] lemma re_nnqsmul (q : ℚ≥0) (z : ℂ) : (q • z).re = q • z.re := smul_re ..
@[simp] lemma im_nnqsmul (q : ℚ≥0) (z : ℂ) : (q • z).im = q • z.im := smul_im ..
@[simp] lemma re_qsmul (q : ℚ) (z : ℂ) : (q • z).re = q • z.re := smul_re ..
@[simp] lemma im_qsmul (q : ℚ) (z : ℂ) : (q • z).im = q • z.im := smul_im ..
@[norm_cast] lemma ofReal_nsmul (n : ℕ) (r : ℝ) : ↑(n • r) = n • (r : ℂ) := by simp
@[norm_cast] lemma ofReal_zsmul (n : ℤ) (r : ℝ) : ↑(n • r) = n • (r : ℂ) := by simp
/-! ### Complex conjugation -/
/-- This defines the complex conjugate as the `star` operation of the `StarRing ℂ`. It
is recommended to use the ring endomorphism version `starRingEnd`, available under the
notation `conj` in the locale `ComplexConjugate`. -/
instance : StarRing ℂ where
star z := ⟨z.re, -z.im⟩
star_involutive x := by simp only [eta, neg_neg]
star_mul a b := by ext <;> simp [add_comm] <;> ring
star_add a b := by ext <;> simp [add_comm]
@[simp]
theorem conj_re (z : ℂ) : (conj z).re = z.re :=
rfl
@[simp]
theorem conj_im (z : ℂ) : (conj z).im = -z.im :=
rfl
@[simp]
theorem conj_ofReal (r : ℝ) : conj (r : ℂ) = r :=
Complex.ext_iff.2 <| by simp [star]
@[simp]
theorem conj_I : conj I = -I :=
Complex.ext_iff.2 <| by simp
theorem conj_natCast (n : ℕ) : conj (n : ℂ) = n := map_natCast _ _
theorem conj_ofNat (n : ℕ) [n.AtLeastTwo] : conj (ofNat(n) : ℂ) = ofNat(n) :=
map_ofNat _ _
theorem conj_neg_I : conj (-I) = I := by simp
theorem conj_eq_iff_real {z : ℂ} : conj z = z ↔ ∃ r : ℝ, z = r :=
⟨fun h => ⟨z.re, ext rfl <| eq_zero_of_neg_eq (congr_arg im h)⟩, fun ⟨h, e⟩ => by
rw [e, conj_ofReal]⟩
theorem conj_eq_iff_re {z : ℂ} : conj z = z ↔ (z.re : ℂ) = z :=
conj_eq_iff_real.trans ⟨by rintro ⟨r, rfl⟩; simp [ofReal], fun h => ⟨_, h.symm⟩⟩
theorem conj_eq_iff_im {z : ℂ} : conj z = z ↔ z.im = 0 :=
⟨fun h => add_self_eq_zero.mp (neg_eq_iff_add_eq_zero.mp (congr_arg im h)), fun h =>
ext rfl (neg_eq_iff_add_eq_zero.mpr (add_self_eq_zero.mpr h))⟩
@[simp]
theorem star_def : (Star.star : ℂ → ℂ) = conj :=
rfl
/-! ### Norm squared -/
/-- The norm squared function. -/
@[pp_nodot]
def normSq : ℂ →*₀ ℝ where
toFun z := z.re * z.re + z.im * z.im
map_zero' := by simp
map_one' := by simp
map_mul' z w := by
dsimp
ring
theorem normSq_apply (z : ℂ) : normSq z = z.re * z.re + z.im * z.im :=
rfl
@[simp]
theorem normSq_ofReal (r : ℝ) : normSq r = r * r := by
simp [normSq, ofReal]
@[simp]
theorem normSq_natCast (n : ℕ) : normSq n = n * n := normSq_ofReal _
@[simp]
theorem normSq_intCast (z : ℤ) : normSq z = z * z := normSq_ofReal _
@[simp]
theorem normSq_ratCast (q : ℚ) : normSq q = q * q := normSq_ofReal _
@[simp]
theorem normSq_ofNat (n : ℕ) [n.AtLeastTwo] :
normSq (ofNat(n) : ℂ) = ofNat(n) * ofNat(n) :=
normSq_natCast _
@[simp]
theorem normSq_mk (x y : ℝ) : normSq ⟨x, y⟩ = x * x + y * y :=
rfl
theorem normSq_add_mul_I (x y : ℝ) : normSq (x + y * I) = x ^ 2 + y ^ 2 := by
rw [← mk_eq_add_mul_I, normSq_mk, sq, sq]
theorem normSq_eq_conj_mul_self {z : ℂ} : (normSq z : ℂ) = conj z * z := by
ext <;> simp [normSq, mul_comm, ofReal]
theorem normSq_zero : normSq 0 = 0 := by simp
theorem normSq_one : normSq 1 = 1 := by simp
@[simp]
theorem normSq_I : normSq I = 1 := by simp [normSq]
theorem normSq_nonneg (z : ℂ) : 0 ≤ normSq z :=
add_nonneg (mul_self_nonneg _) (mul_self_nonneg _)
theorem normSq_eq_zero {z : ℂ} : normSq z = 0 ↔ z = 0 :=
⟨fun h =>
ext (eq_zero_of_mul_self_add_mul_self_eq_zero h)
(eq_zero_of_mul_self_add_mul_self_eq_zero <| (add_comm _ _).trans h),
fun h => h.symm ▸ normSq_zero⟩
@[simp]
theorem normSq_pos {z : ℂ} : 0 < normSq z ↔ z ≠ 0 :=
(normSq_nonneg z).lt_iff_ne.trans <| not_congr (eq_comm.trans normSq_eq_zero)
@[simp]
theorem normSq_neg (z : ℂ) : normSq (-z) = normSq z := by simp [normSq]
@[simp]
theorem normSq_conj (z : ℂ) : normSq (conj z) = normSq z := by simp [normSq]
theorem normSq_mul (z w : ℂ) : normSq (z * w) = normSq z * normSq w :=
normSq.map_mul z w
theorem normSq_add (z w : ℂ) : normSq (z + w) = normSq z + normSq w + 2 * (z * conj w).re := by
dsimp [normSq]; ring
theorem re_sq_le_normSq (z : ℂ) : z.re * z.re ≤ normSq z :=
le_add_of_nonneg_right (mul_self_nonneg _)
theorem im_sq_le_normSq (z : ℂ) : z.im * z.im ≤ normSq z :=
le_add_of_nonneg_left (mul_self_nonneg _)
theorem mul_conj (z : ℂ) : z * conj z = normSq z :=
Complex.ext_iff.2 <| by simp [normSq, mul_comm, sub_eq_neg_add, add_comm, ofReal]
theorem add_conj (z : ℂ) : z + conj z = (2 * z.re : ℝ) :=
Complex.ext_iff.2 <| by simp [two_mul, ofReal]
/-- The coercion `ℝ → ℂ` as a `RingHom`. -/
def ofRealHom : ℝ →+* ℂ where
toFun x := (x : ℂ)
map_one' := ofReal_one
map_zero' := ofReal_zero
map_mul' := ofReal_mul
map_add' := ofReal_add
@[simp] lemma ofRealHom_eq_coe (r : ℝ) : ofRealHom r = r := rfl
variable {α : Type*}
@[simp] lemma ofReal_comp_add (f g : α → ℝ) : ofReal ∘ (f + g) = ofReal ∘ f + ofReal ∘ g :=
map_comp_add ofRealHom ..
@[simp] lemma ofReal_comp_sub (f g : α → ℝ) : ofReal ∘ (f - g) = ofReal ∘ f - ofReal ∘ g :=
map_comp_sub ofRealHom ..
@[simp] lemma ofReal_comp_neg (f : α → ℝ) : ofReal ∘ (-f) = -(ofReal ∘ f) :=
map_comp_neg ofRealHom _
lemma ofReal_comp_nsmul (n : ℕ) (f : α → ℝ) : ofReal ∘ (n • f) = n • (ofReal ∘ f) :=
map_comp_nsmul ofRealHom ..
lemma ofReal_comp_zsmul (n : ℤ) (f : α → ℝ) : ofReal ∘ (n • f) = n • (ofReal ∘ f) :=
map_comp_zsmul ofRealHom ..
@[simp] lemma ofReal_comp_mul (f g : α → ℝ) : ofReal ∘ (f * g) = ofReal ∘ f * ofReal ∘ g :=
map_comp_mul ofRealHom ..
@[simp] lemma ofReal_comp_pow (f : α → ℝ) (n : ℕ) : ofReal ∘ (f ^ n) = (ofReal ∘ f) ^ n :=
map_comp_pow ofRealHom ..
@[simp]
theorem I_sq : I ^ 2 = -1 := by rw [sq, I_mul_I]
@[simp]
lemma I_pow_three : I ^ 3 = -I := by rw [pow_succ, I_sq, neg_one_mul]
@[simp]
theorem I_pow_four : I ^ 4 = 1 := by rw [(by norm_num : 4 = 2 * 2), pow_mul, I_sq, neg_one_sq]
lemma I_pow_eq_pow_mod (n : ℕ) : I ^ n = I ^ (n % 4) := by
conv_lhs => rw [← Nat.div_add_mod n 4]
simp [pow_add, pow_mul, I_pow_four]
@[simp]
theorem sub_re (z w : ℂ) : (z - w).re = z.re - w.re :=
rfl
@[simp]
theorem sub_im (z w : ℂ) : (z - w).im = z.im - w.im :=
rfl
@[simp, norm_cast]
theorem ofReal_sub (r s : ℝ) : ((r - s : ℝ) : ℂ) = r - s :=
Complex.ext_iff.2 <| by simp [ofReal]
@[simp, norm_cast]
theorem ofReal_pow (r : ℝ) (n : ℕ) : ((r ^ n : ℝ) : ℂ) = (r : ℂ) ^ n := by
induction n <;> simp [*, ofReal_mul, pow_succ]
theorem sub_conj (z : ℂ) : z - conj z = (2 * z.im : ℝ) * I :=
Complex.ext_iff.2 <| by simp [two_mul, sub_eq_add_neg, ofReal]
theorem normSq_sub (z w : ℂ) : normSq (z - w) = normSq z + normSq w - 2 * (z * conj w).re := by
rw [sub_eq_add_neg, normSq_add]
simp only [RingHom.map_neg, mul_neg, neg_re, normSq_neg]
ring
/-! ### Inversion -/
noncomputable instance : Inv ℂ :=
⟨fun z => conj z * ((normSq z)⁻¹ : ℝ)⟩
theorem inv_def (z : ℂ) : z⁻¹ = conj z * ((normSq z)⁻¹ : ℝ) :=
rfl
@[simp]
theorem inv_re (z : ℂ) : z⁻¹.re = z.re / normSq z := by simp [inv_def, division_def, ofReal]
@[simp]
theorem inv_im (z : ℂ) : z⁻¹.im = -z.im / normSq z := by simp [inv_def, division_def, ofReal]
@[simp, norm_cast]
theorem ofReal_inv (r : ℝ) : ((r⁻¹ : ℝ) : ℂ) = (r : ℂ)⁻¹ :=
Complex.ext_iff.2 <| by simp [ofReal]
protected theorem inv_zero : (0⁻¹ : ℂ) = 0 := by
rw [← ofReal_zero, ← ofReal_inv, inv_zero]
protected theorem mul_inv_cancel {z : ℂ} (h : z ≠ 0) : z * z⁻¹ = 1 := by
rw [inv_def, ← mul_assoc, mul_conj, ← ofReal_mul, mul_inv_cancel₀ (mt normSq_eq_zero.1 h),
ofReal_one]
noncomputable instance instDivInvMonoid : DivInvMonoid ℂ where
lemma div_re (z w : ℂ) : (z / w).re = z.re * w.re / normSq w + z.im * w.im / normSq w := by
simp [div_eq_mul_inv, mul_assoc, sub_eq_add_neg]
lemma div_im (z w : ℂ) : (z / w).im = z.im * w.re / normSq w - z.re * w.im / normSq w := by
simp [div_eq_mul_inv, mul_assoc, sub_eq_add_neg, add_comm]
/-! ### Field instance and lemmas -/
noncomputable instance instField : Field ℂ where
mul_inv_cancel := @Complex.mul_inv_cancel
inv_zero := Complex.inv_zero
nnqsmul := (· • ·)
qsmul := (· • ·)
nnratCast_def q := by ext <;> simp [NNRat.cast_def, div_re, div_im, mul_div_mul_comm]
ratCast_def q := by ext <;> simp [Rat.cast_def, div_re, div_im, mul_div_mul_comm]
nnqsmul_def n z := Complex.ext_iff.2 <| by simp [NNRat.smul_def, smul_re, smul_im]
qsmul_def n z := Complex.ext_iff.2 <| by simp [Rat.smul_def, smul_re, smul_im]
@[simp, norm_cast]
lemma ofReal_nnqsmul (q : ℚ≥0) (r : ℝ) : ofReal (q • r) = q • r := by simp [NNRat.smul_def]
@[simp, norm_cast]
lemma ofReal_qsmul (q : ℚ) (r : ℝ) : ofReal (q • r) = q • r := by simp [Rat.smul_def]
theorem conj_inv (x : ℂ) : conj x⁻¹ = (conj x)⁻¹ :=
star_inv₀ _
@[simp, norm_cast]
theorem ofReal_div (r s : ℝ) : ((r / s : ℝ) : ℂ) = r / s := map_div₀ ofRealHom r s
@[simp, norm_cast]
theorem ofReal_zpow (r : ℝ) (n : ℤ) : ((r ^ n : ℝ) : ℂ) = (r : ℂ) ^ n := map_zpow₀ ofRealHom r n
@[simp]
theorem div_I (z : ℂ) : z / I = -(z * I) :=
(div_eq_iff_mul_eq I_ne_zero).2 <| by simp [mul_assoc]
@[simp]
theorem inv_I : I⁻¹ = -I := by
rw [inv_eq_one_div, div_I, one_mul]
theorem normSq_inv (z : ℂ) : normSq z⁻¹ = (normSq z)⁻¹ := by simp
theorem normSq_div (z w : ℂ) : normSq (z / w) = normSq z / normSq w := by simp
lemma div_ofReal (z : ℂ) (x : ℝ) : z / x = ⟨z.re / x, z.im / x⟩ := by
simp_rw [div_eq_inv_mul, ← ofReal_inv, ofReal_mul']
lemma div_natCast (z : ℂ) (n : ℕ) : z / n = ⟨z.re / n, z.im / n⟩ :=
mod_cast div_ofReal z n
lemma div_intCast (z : ℂ) (n : ℤ) : z / n = ⟨z.re / n, z.im / n⟩ :=
mod_cast div_ofReal z n
lemma div_ratCast (z : ℂ) (x : ℚ) : z / x = ⟨z.re / x, z.im / x⟩ :=
mod_cast div_ofReal z x
lemma div_ofNat (z : ℂ) (n : ℕ) [n.AtLeastTwo] :
z / ofNat(n) = ⟨z.re / ofNat(n), z.im / ofNat(n)⟩ :=
div_natCast z n
@[simp] lemma div_ofReal_re (z : ℂ) (x : ℝ) : (z / x).re = z.re / x := by rw [div_ofReal]
@[simp] lemma div_ofReal_im (z : ℂ) (x : ℝ) : (z / x).im = z.im / x := by rw [div_ofReal]
@[simp] lemma div_natCast_re (z : ℂ) (n : ℕ) : (z / n).re = z.re / n := by rw [div_natCast]
@[simp] lemma div_natCast_im (z : ℂ) (n : ℕ) : (z / n).im = z.im / n := by rw [div_natCast]
@[simp] lemma div_intCast_re (z : ℂ) (n : ℤ) : (z / n).re = z.re / n := by rw [div_intCast]
@[simp] lemma div_intCast_im (z : ℂ) (n : ℤ) : (z / n).im = z.im / n := by rw [div_intCast]
@[simp] lemma div_ratCast_re (z : ℂ) (x : ℚ) : (z / x).re = z.re / x := by rw [div_ratCast]
@[simp] lemma div_ratCast_im (z : ℂ) (x : ℚ) : (z / x).im = z.im / x := by rw [div_ratCast]
@[simp]
lemma div_ofNat_re (z : ℂ) (n : ℕ) [n.AtLeastTwo] :
(z / ofNat(n)).re = z.re / ofNat(n) := div_natCast_re z n
@[simp]
lemma div_ofNat_im (z : ℂ) (n : ℕ) [n.AtLeastTwo] :
(z / ofNat(n)).im = z.im / ofNat(n) := div_natCast_im z n
/-! ### Characteristic zero -/
instance instCharZero : CharZero ℂ :=
charZero_of_inj_zero fun n h => by rwa [← ofReal_natCast, ofReal_eq_zero, Nat.cast_eq_zero] at h
/-- A complex number `z` plus its conjugate `conj z` is `2` times its real part. -/
theorem re_eq_add_conj (z : ℂ) : (z.re : ℂ) = (z + conj z) / 2 := by
simp only [add_conj, ofReal_mul, ofReal_ofNat, mul_div_cancel_left₀ (z.re : ℂ) two_ne_zero]
/-- A complex number `z` minus its conjugate `conj z` is `2i` times its imaginary part. -/
theorem im_eq_sub_conj (z : ℂ) : (z.im : ℂ) = (z - conj z) / (2 * I) := by
simp only [sub_conj, ofReal_mul, ofReal_ofNat, mul_right_comm,
mul_div_cancel_left₀ _ (mul_ne_zero two_ne_zero I_ne_zero : 2 * I ≠ 0)]
/-- Show the imaginary number ⟨x, y⟩ as an "x + y*I" string
Note that the Real numbers used for x and y will show as cauchy sequences due to the way Real
numbers are represented.
-/
unsafe instance instRepr : Repr ℂ where
reprPrec f p :=
(if p > 65 then (Std.Format.bracket "(" · ")") else (·)) <|
reprPrec f.re 65 ++ " + " ++ reprPrec f.im 70 ++ "*I"
section reProdIm
/-- The preimage under `equivRealProd` of `s ×ˢ t` is `s ×ℂ t`. -/
lemma preimage_equivRealProd_prod (s t : Set ℝ) : equivRealProd ⁻¹' (s ×ˢ t) = s ×ℂ t := rfl
/-- The inequality `s × t ⊆ s₁ × t₁` holds in `ℂ` iff it holds in `ℝ × ℝ`. -/
lemma reProdIm_subset_iff {s s₁ t t₁ : Set ℝ} : s ×ℂ t ⊆ s₁ ×ℂ t₁ ↔ s ×ˢ t ⊆ s₁ ×ˢ t₁ := by
rw [← @preimage_equivRealProd_prod s t, ← @preimage_equivRealProd_prod s₁ t₁]
exact Equiv.preimage_subset equivRealProd _ _
/-- If `s ⊆ s₁ ⊆ ℝ` and `t ⊆ t₁ ⊆ ℝ`, then `s × t ⊆ s₁ × t₁` in `ℂ`. -/
lemma reProdIm_subset_iff' {s s₁ t t₁ : Set ℝ} :
s ×ℂ t ⊆ s₁ ×ℂ t₁ ↔ s ⊆ s₁ ∧ t ⊆ t₁ ∨ s = ∅ ∨ t = ∅ := by
convert prod_subset_prod_iff
exact reProdIm_subset_iff
variable {s t : Set ℝ}
@[simp] lemma reProdIm_nonempty : (s ×ℂ t).Nonempty ↔ s.Nonempty ∧ t.Nonempty := by
simp [Set.Nonempty, reProdIm, Complex.exists]
@[simp] lemma reProdIm_eq_empty : s ×ℂ t = ∅ ↔ s = ∅ ∨ t = ∅ := by
simp [← not_nonempty_iff_eq_empty, reProdIm_nonempty, -not_and, not_and_or]
end reProdIm
open scoped Interval
section Rectangle
/-- A `Rectangle` is an axis-parallel rectangle with corners `z` and `w`. -/
def Rectangle (z w : ℂ) : Set ℂ := [[z.re, w.re]] ×ℂ [[z.im, w.im]]
end Rectangle
section Segments
/-- A real segment `[a₁, a₂]` translated by `b * I` is the complex line segment. -/
lemma horizontalSegment_eq (a₁ a₂ b : ℝ) :
(fun (x : ℝ) ↦ x + b * I) '' [[a₁, a₂]] = [[a₁, a₂]] ×ℂ {b} := by
rw [← preimage_equivRealProd_prod]
ext x
constructor
· intro hx
obtain ⟨x₁, hx₁, hx₁'⟩ := hx
simp [← hx₁', mem_preimage, mem_prod, hx₁]
· intro hx
obtain ⟨x₁, hx₁, hx₁', hx₁''⟩ := hx
refine ⟨x.re, x₁, by simp⟩
/-- A vertical segment `[b₁, b₂]` translated by `a` is the complex line segment. -/
lemma verticalSegment_eq (a b₁ b₂ : ℝ) :
(fun (y : ℝ) ↦ a + y * I) '' [[b₁, b₂]] = {a} ×ℂ [[b₁, b₂]] := by
rw [← preimage_equivRealProd_prod]
ext x
constructor
· intro hx
obtain ⟨x₁, hx₁, hx₁'⟩ := hx
simp [← hx₁', mem_preimage, mem_prod, hx₁]
· intro hx
simp only [equivRealProd_apply, singleton_prod, mem_image, Prod.mk.injEq,
exists_eq_right_right, mem_preimage] at hx
obtain ⟨x₁, hx₁, hx₁', hx₁''⟩ := hx
refine ⟨x.im, x₁, by simp⟩
end Segments
end Complex
| Mathlib/Data/Complex/Basic.lean | 909 | 910 | |
/-
Copyright (c) 2023 Rémy Degenne. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Rémy Degenne
-/
import Mathlib.Probability.Kernel.Disintegration.Unique
import Mathlib.Probability.Notation
/-!
# Regular conditional probability distribution
We define the regular conditional probability distribution of `Y : α → Ω` given `X : α → β`, where
`Ω` is a standard Borel space. This is a `Kernel β Ω` such that for almost all `a`, `condDistrib`
evaluated at `X a` and a measurable set `s` is equal to the conditional expectation
`μ⟦Y ⁻¹' s | mβ.comap X⟧` evaluated at `a`.
`μ⟦Y ⁻¹' s | mβ.comap X⟧` maps a measurable set `s` to a function `α → ℝ≥0∞`, and for all `s` that
map is unique up to a `μ`-null set. For all `a`, the map from sets to `ℝ≥0∞` that we obtain that way
verifies some of the properties of a measure, but in general the fact that the `μ`-null set depends
on `s` can prevent us from finding versions of the conditional expectation that combine into a true
measure. The standard Borel space assumption on `Ω` allows us to do so.
The case `Y = X = id` is developed in more detail in `Probability/Kernel/Condexp.lean`: here `X` is
understood as a map from `Ω` with a sub-σ-algebra `m` to `Ω` with its default σ-algebra and the
conditional distribution defines a kernel associated with the conditional expectation with respect
to `m`.
## Main definitions
* `condDistrib Y X μ`: regular conditional probability distribution of `Y : α → Ω` given
`X : α → β`, where `Ω` is a standard Borel space.
## Main statements
* `condDistrib_ae_eq_condExp`: for almost all `a`, `condDistrib` evaluated at `X a` and a
measurable set `s` is equal to the conditional expectation `μ⟦Y ⁻¹' s | mβ.comap X⟧ a`.
* `condExp_prod_ae_eq_integral_condDistrib`: the conditional expectation
`μ[(fun a => f (X a, Y a)) | X; mβ]` is almost everywhere equal to the integral
`∫ y, f (X a, y) ∂(condDistrib Y X μ (X a))`.
-/
open MeasureTheory Set Filter TopologicalSpace
open scoped ENNReal MeasureTheory ProbabilityTheory
namespace ProbabilityTheory
variable {α β Ω F : Type*} [MeasurableSpace Ω] [StandardBorelSpace Ω]
[Nonempty Ω] [NormedAddCommGroup F] {mα : MeasurableSpace α} {μ : Measure α} [IsFiniteMeasure μ]
{X : α → β} {Y : α → Ω}
/-- **Regular conditional probability distribution**: kernel associated with the conditional
expectation of `Y` given `X`.
For almost all `a`, `condDistrib Y X μ` evaluated at `X a` and a measurable set `s` is equal to
the conditional expectation `μ⟦Y ⁻¹' s | mβ.comap X⟧ a`. It also satisfies the equality
`μ[(fun a => f (X a, Y a)) | mβ.comap X] =ᵐ[μ] fun a => ∫ y, f (X a, y) ∂(condDistrib Y X μ (X a))`
for all integrable functions `f`. -/
noncomputable irreducible_def condDistrib {_ : MeasurableSpace α} [MeasurableSpace β] (Y : α → Ω)
(X : α → β) (μ : Measure α) [IsFiniteMeasure μ] : Kernel β Ω :=
(μ.map fun a => (X a, Y a)).condKernel
instance [MeasurableSpace β] : IsMarkovKernel (condDistrib Y X μ) := by
rw [condDistrib]; infer_instance
variable {mβ : MeasurableSpace β} {s : Set Ω} {t : Set β} {f : β × Ω → F}
/-- If the singleton `{x}` has non-zero mass for `μ.map X`, then for all `s : Set Ω`,
`condDistrib Y X μ x s = (μ.map X {x})⁻¹ * μ.map (fun a => (X a, Y a)) ({x} ×ˢ s)` . -/
lemma condDistrib_apply_of_ne_zero [MeasurableSingletonClass β]
(hY : Measurable Y) (x : β) (hX : μ.map X {x} ≠ 0) (s : Set Ω) :
condDistrib Y X μ x s = (μ.map X {x})⁻¹ * μ.map (fun a => (X a, Y a)) ({x} ×ˢ s) := by
rw [condDistrib, Measure.condKernel_apply_of_ne_zero _ s]
· rw [Measure.fst_map_prodMk hY]
· rwa [Measure.fst_map_prodMk hY]
lemma compProd_map_condDistrib (hY : AEMeasurable Y μ) :
(μ.map X) ⊗ₘ condDistrib Y X μ = μ.map fun a ↦ (X a, Y a) := by
rw [condDistrib, ← Measure.fst_map_prodMk₀ hY, Measure.disintegrate]
section Measurability
theorem measurable_condDistrib (hs : MeasurableSet s) :
Measurable[mβ.comap X] fun a => condDistrib Y X μ (X a) s :=
(Kernel.measurable_coe _ hs).comp (Measurable.of_comap_le le_rfl)
| theorem _root_.MeasureTheory.AEStronglyMeasurable.ae_integrable_condDistrib_map_iff
(hY : AEMeasurable Y μ) (hf : AEStronglyMeasurable f (μ.map fun a => (X a, Y a))) :
(∀ᵐ a ∂μ.map X, Integrable (fun ω => f (a, ω)) (condDistrib Y X μ a)) ∧
Integrable (fun a => ∫ ω, ‖f (a, ω)‖ ∂condDistrib Y X μ a) (μ.map X) ↔
Integrable f (μ.map fun a => (X a, Y a)) := by
rw [condDistrib, ← hf.ae_integrable_condKernel_iff, Measure.fst_map_prodMk₀ hY]
| Mathlib/Probability/Kernel/CondDistrib.lean | 88 | 93 |
/-
Copyright (c) 2018 Ellen Arlt. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Ellen Arlt, Blair Shi, Sean Leather, Mario Carneiro, Johan Commelin, Lu-Ming Zhang
-/
import Mathlib.Algebra.Algebra.Opposite
import Mathlib.Algebra.Algebra.Pi
import Mathlib.Algebra.BigOperators.RingEquiv
import Mathlib.Data.Finite.Prod
import Mathlib.Data.Matrix.Mul
import Mathlib.LinearAlgebra.Pi
/-!
# Matrices
This file contains basic results on matrices including bundled versions of matrix operators.
## Implementation notes
For convenience, `Matrix m n α` is defined as `m → n → α`, as this allows elements of the matrix
to be accessed with `A i j`. However, it is not advisable to _construct_ matrices using terms of the
form `fun i j ↦ _` or even `(fun i j ↦ _ : Matrix m n α)`, as these are not recognized by Lean
as having the right type. Instead, `Matrix.of` should be used.
## TODO
Under various conditions, multiplication of infinite matrices makes sense.
These have not yet been implemented.
-/
assert_not_exists Star
universe u u' v w
variable {l m n o : Type*} {m' : o → Type*} {n' : o → Type*}
variable {R : Type*} {S : Type*} {α : Type v} {β : Type w} {γ : Type*}
namespace Matrix
instance decidableEq [DecidableEq α] [Fintype m] [Fintype n] : DecidableEq (Matrix m n α) :=
Fintype.decidablePiFintype
instance {n m} [Fintype m] [DecidableEq m] [Fintype n] [DecidableEq n] (α) [Fintype α] :
Fintype (Matrix m n α) := inferInstanceAs (Fintype (m → n → α))
instance {n m} [Finite m] [Finite n] (α) [Finite α] :
Finite (Matrix m n α) := inferInstanceAs (Finite (m → n → α))
section
variable (R)
/-- This is `Matrix.of` bundled as a linear equivalence. -/
def ofLinearEquiv [Semiring R] [AddCommMonoid α] [Module R α] : (m → n → α) ≃ₗ[R] Matrix m n α where
__ := ofAddEquiv
map_smul' _ _ := rfl
@[simp] lemma coe_ofLinearEquiv [Semiring R] [AddCommMonoid α] [Module R α] :
⇑(ofLinearEquiv _ : (m → n → α) ≃ₗ[R] Matrix m n α) = of := rfl
@[simp] lemma coe_ofLinearEquiv_symm [Semiring R] [AddCommMonoid α] [Module R α] :
⇑((ofLinearEquiv _).symm : Matrix m n α ≃ₗ[R] (m → n → α)) = of.symm := rfl
end
theorem sum_apply [AddCommMonoid α] (i : m) (j : n) (s : Finset β) (g : β → Matrix m n α) :
(∑ c ∈ s, g c) i j = ∑ c ∈ s, g c i j :=
(congr_fun (s.sum_apply i g) j).trans (s.sum_apply j _)
end Matrix
open Matrix
namespace Matrix
section Diagonal
variable [DecidableEq n]
variable (n α)
/-- `Matrix.diagonal` as an `AddMonoidHom`. -/
@[simps]
def diagonalAddMonoidHom [AddZeroClass α] : (n → α) →+ Matrix n n α where
toFun := diagonal
map_zero' := diagonal_zero
map_add' x y := (diagonal_add x y).symm
variable (R)
/-- `Matrix.diagonal` as a `LinearMap`. -/
@[simps]
def diagonalLinearMap [Semiring R] [AddCommMonoid α] [Module R α] : (n → α) →ₗ[R] Matrix n n α :=
{ diagonalAddMonoidHom n α with map_smul' := diagonal_smul }
variable {n α R}
section One
variable [Zero α] [One α]
lemma zero_le_one_elem [Preorder α] [ZeroLEOneClass α] (i j : n) :
0 ≤ (1 : Matrix n n α) i j := by
by_cases hi : i = j
· subst hi
simp
· simp [hi]
lemma zero_le_one_row [Preorder α] [ZeroLEOneClass α] (i : n) :
0 ≤ (1 : Matrix n n α) i :=
zero_le_one_elem i
end One
end Diagonal
section Diag
variable (n α)
/-- `Matrix.diag` as an `AddMonoidHom`. -/
@[simps]
def diagAddMonoidHom [AddZeroClass α] : Matrix n n α →+ n → α where
toFun := diag
map_zero' := diag_zero
map_add' := diag_add
variable (R)
/-- `Matrix.diag` as a `LinearMap`. -/
@[simps]
def diagLinearMap [Semiring R] [AddCommMonoid α] [Module R α] : Matrix n n α →ₗ[R] n → α :=
{ diagAddMonoidHom n α with map_smul' := diag_smul }
variable {n α R}
@[simp]
theorem diag_list_sum [AddMonoid α] (l : List (Matrix n n α)) : diag l.sum = (l.map diag).sum :=
map_list_sum (diagAddMonoidHom n α) l
@[simp]
theorem diag_multiset_sum [AddCommMonoid α] (s : Multiset (Matrix n n α)) :
diag s.sum = (s.map diag).sum :=
map_multiset_sum (diagAddMonoidHom n α) s
@[simp]
theorem diag_sum {ι} [AddCommMonoid α] (s : Finset ι) (f : ι → Matrix n n α) :
diag (∑ i ∈ s, f i) = ∑ i ∈ s, diag (f i) :=
map_sum (diagAddMonoidHom n α) f s
end Diag
open Matrix
section AddCommMonoid
variable [AddCommMonoid α] [Mul α]
end AddCommMonoid
section NonAssocSemiring
variable [NonAssocSemiring α]
variable (α n)
/-- `Matrix.diagonal` as a `RingHom`. -/
@[simps]
def diagonalRingHom [Fintype n] [DecidableEq n] : (n → α) →+* Matrix n n α :=
{ diagonalAddMonoidHom n α with
toFun := diagonal
map_one' := diagonal_one
map_mul' := fun _ _ => (diagonal_mul_diagonal' _ _).symm }
end NonAssocSemiring
section Semiring
variable [Semiring α]
theorem diagonal_pow [Fintype n] [DecidableEq n] (v : n → α) (k : ℕ) :
diagonal v ^ k = diagonal (v ^ k) :=
(map_pow (diagonalRingHom n α) v k).symm
/-- The ring homomorphism `α →+* Matrix n n α`
sending `a` to the diagonal matrix with `a` on the diagonal.
-/
def scalar (n : Type u) [DecidableEq n] [Fintype n] : α →+* Matrix n n α :=
(diagonalRingHom n α).comp <| Pi.constRingHom n α
section Scalar
variable [DecidableEq n] [Fintype n]
@[simp]
theorem scalar_apply (a : α) : scalar n a = diagonal fun _ => a :=
rfl
theorem scalar_inj [Nonempty n] {r s : α} : scalar n r = scalar n s ↔ r = s :=
(diagonal_injective.comp Function.const_injective).eq_iff
theorem scalar_commute_iff {r : α} {M : Matrix n n α} :
Commute (scalar n r) M ↔ r • M = MulOpposite.op r • M := by
simp_rw [Commute, SemiconjBy, scalar_apply, ← smul_eq_diagonal_mul, ← op_smul_eq_mul_diagonal]
theorem scalar_commute (r : α) (hr : ∀ r', Commute r r') (M : Matrix n n α) :
Commute (scalar n r) M := scalar_commute_iff.2 <| ext fun _ _ => hr _
end Scalar
end Semiring
section Algebra
variable [Fintype n] [DecidableEq n]
variable [CommSemiring R] [Semiring α] [Semiring β] [Algebra R α] [Algebra R β]
instance instAlgebra : Algebra R (Matrix n n α) where
algebraMap := (Matrix.scalar n).comp (algebraMap R α)
commutes' _ _ := scalar_commute _ (fun _ => Algebra.commutes _ _) _
smul_def' r x := by ext; simp [Matrix.scalar, Algebra.smul_def r]
theorem algebraMap_matrix_apply {r : R} {i j : n} :
algebraMap R (Matrix n n α) r i j = if i = j then algebraMap R α r else 0 := by
dsimp [algebraMap, Algebra.algebraMap, Matrix.scalar]
split_ifs with h <;> simp [h, Matrix.one_apply_ne]
theorem algebraMap_eq_diagonal (r : R) :
algebraMap R (Matrix n n α) r = diagonal (algebraMap R (n → α) r) := rfl
theorem algebraMap_eq_diagonalRingHom :
algebraMap R (Matrix n n α) = (diagonalRingHom n α).comp (algebraMap R _) := rfl
@[simp]
theorem map_algebraMap (r : R) (f : α → β) (hf : f 0 = 0)
(hf₂ : f (algebraMap R α r) = algebraMap R β r) :
(algebraMap R (Matrix n n α) r).map f = algebraMap R (Matrix n n β) r := by
rw [algebraMap_eq_diagonal, algebraMap_eq_diagonal, diagonal_map hf]
simp [hf₂]
variable (R)
/-- `Matrix.diagonal` as an `AlgHom`. -/
@[simps]
def diagonalAlgHom : (n → α) →ₐ[R] Matrix n n α :=
{ diagonalRingHom n α with
toFun := diagonal
commutes' := fun r => (algebraMap_eq_diagonal r).symm }
end Algebra
section AddHom
variable [Add α]
variable (R α) in
/-- Extracting entries from a matrix as an additive homomorphism. -/
@[simps]
def entryAddHom (i : m) (j : n) : AddHom (Matrix m n α) α where
toFun M := M i j
map_add' _ _ := rfl
-- It is necessary to spell out the name of the coercion explicitly on the RHS
-- for unification to succeed
lemma entryAddHom_eq_comp {i : m} {j : n} :
entryAddHom α i j =
((Pi.evalAddHom (fun _ => α) j).comp (Pi.evalAddHom _ i)).comp
(AddHomClass.toAddHom ofAddEquiv.symm) :=
rfl
end AddHom
section AddMonoidHom
variable [AddZeroClass α]
variable (R α) in
/--
Extracting entries from a matrix as an additive monoid homomorphism. Note this cannot be upgraded to
a ring homomorphism, as it does not respect multiplication.
-/
@[simps]
def entryAddMonoidHom (i : m) (j : n) : Matrix m n α →+ α where
toFun M := M i j
map_add' _ _ := rfl
map_zero' := rfl
-- It is necessary to spell out the name of the coercion explicitly on the RHS
-- for unification to succeed
lemma entryAddMonoidHom_eq_comp {i : m} {j : n} :
entryAddMonoidHom α i j =
((Pi.evalAddMonoidHom (fun _ => α) j).comp (Pi.evalAddMonoidHom _ i)).comp
(AddMonoidHomClass.toAddMonoidHom ofAddEquiv.symm) := by
rfl
@[simp] lemma evalAddMonoidHom_comp_diagAddMonoidHom (i : m) :
(Pi.evalAddMonoidHom _ i).comp (diagAddMonoidHom m α) = entryAddMonoidHom α i i := by
simp [AddMonoidHom.ext_iff]
@[simp] lemma entryAddMonoidHom_toAddHom {i : m} {j : n} :
(entryAddMonoidHom α i j : AddHom _ _) = entryAddHom α i j := rfl
end AddMonoidHom
section LinearMap
variable [Semiring R] [AddCommMonoid α] [Module R α]
variable (R α) in
/--
Extracting entries from a matrix as a linear map. Note this cannot be upgraded to an algebra
homomorphism, as it does not respect multiplication.
-/
@[simps]
def entryLinearMap (i : m) (j : n) :
Matrix m n α →ₗ[R] α where
toFun M := M i j
map_add' _ _ := rfl
map_smul' _ _ := rfl
-- It is necessary to spell out the name of the coercion explicitly on the RHS
-- for unification to succeed
lemma entryLinearMap_eq_comp {i : m} {j : n} :
entryLinearMap R α i j =
LinearMap.proj j ∘ₗ LinearMap.proj i ∘ₗ (ofLinearEquiv R).symm.toLinearMap := by
rfl
@[simp] lemma proj_comp_diagLinearMap (i : m) :
LinearMap.proj i ∘ₗ diagLinearMap m R α = entryLinearMap R α i i := by
simp [LinearMap.ext_iff]
@[simp] lemma entryLinearMap_toAddMonoidHom {i : m} {j : n} :
(entryLinearMap R α i j : _ →+ _) = entryAddMonoidHom α i j := rfl
@[simp] lemma entryLinearMap_toAddHom {i : m} {j : n} :
(entryLinearMap R α i j : AddHom _ _) = entryAddHom α i j := rfl
end LinearMap
end Matrix
/-!
### Bundled versions of `Matrix.map`
-/
namespace Equiv
/-- The `Equiv` between spaces of matrices induced by an `Equiv` between their
coefficients. This is `Matrix.map` as an `Equiv`. -/
@[simps apply]
def mapMatrix (f : α ≃ β) : Matrix m n α ≃ Matrix m n β where
toFun M := M.map f
invFun M := M.map f.symm
left_inv _ := Matrix.ext fun _ _ => f.symm_apply_apply _
right_inv _ := Matrix.ext fun _ _ => f.apply_symm_apply _
@[simp]
theorem mapMatrix_refl : (Equiv.refl α).mapMatrix = Equiv.refl (Matrix m n α) :=
rfl
@[simp]
theorem mapMatrix_symm (f : α ≃ β) : f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m n β ≃ _) :=
rfl
@[simp]
theorem mapMatrix_trans (f : α ≃ β) (g : β ≃ γ) :
f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m n α ≃ _) :=
rfl
end Equiv
namespace AddMonoidHom
variable [AddZeroClass α] [AddZeroClass β] [AddZeroClass γ]
/-- The `AddMonoidHom` between spaces of matrices induced by an `AddMonoidHom` between their
coefficients. This is `Matrix.map` as an `AddMonoidHom`. -/
@[simps]
def mapMatrix (f : α →+ β) : Matrix m n α →+ Matrix m n β where
toFun M := M.map f
map_zero' := Matrix.map_zero f f.map_zero
map_add' := Matrix.map_add f f.map_add
@[simp]
theorem mapMatrix_id : (AddMonoidHom.id α).mapMatrix = AddMonoidHom.id (Matrix m n α) :=
rfl
@[simp]
theorem mapMatrix_comp (f : β →+ γ) (g : α →+ β) :
f.mapMatrix.comp g.mapMatrix = ((f.comp g).mapMatrix : Matrix m n α →+ _) :=
rfl
@[simp] lemma entryAddMonoidHom_comp_mapMatrix (f : α →+ β) (i : m) (j : n) :
(entryAddMonoidHom β i j).comp f.mapMatrix = f.comp (entryAddMonoidHom α i j) := rfl
end AddMonoidHom
namespace AddEquiv
variable [Add α] [Add β] [Add γ]
/-- The `AddEquiv` between spaces of matrices induced by an `AddEquiv` between their
coefficients. This is `Matrix.map` as an `AddEquiv`. -/
@[simps apply]
def mapMatrix (f : α ≃+ β) : Matrix m n α ≃+ Matrix m n β :=
{ f.toEquiv.mapMatrix with
toFun := fun M => M.map f
invFun := fun M => M.map f.symm
map_add' := Matrix.map_add f (map_add f) }
@[simp]
theorem mapMatrix_refl : (AddEquiv.refl α).mapMatrix = AddEquiv.refl (Matrix m n α) :=
rfl
@[simp]
theorem mapMatrix_symm (f : α ≃+ β) : f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m n β ≃+ _) :=
rfl
@[simp]
theorem mapMatrix_trans (f : α ≃+ β) (g : β ≃+ γ) :
f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m n α ≃+ _) :=
rfl
@[simp] lemma entryAddHom_comp_mapMatrix (f : α ≃+ β) (i : m) (j : n) :
(entryAddHom β i j).comp (AddHomClass.toAddHom f.mapMatrix) =
(f : AddHom α β).comp (entryAddHom _ i j) := rfl
end AddEquiv
namespace LinearMap
variable [Semiring R] [AddCommMonoid α] [AddCommMonoid β] [AddCommMonoid γ]
variable [Module R α] [Module R β] [Module R γ]
/-- The `LinearMap` between spaces of matrices induced by a `LinearMap` between their
coefficients. This is `Matrix.map` as a `LinearMap`. -/
@[simps]
def mapMatrix (f : α →ₗ[R] β) : Matrix m n α →ₗ[R] Matrix m n β where
toFun M := M.map f
map_add' := Matrix.map_add f f.map_add
map_smul' r := Matrix.map_smul f r (f.map_smul r)
@[simp]
theorem mapMatrix_id : LinearMap.id.mapMatrix = (LinearMap.id : Matrix m n α →ₗ[R] _) :=
rfl
@[simp]
theorem mapMatrix_comp (f : β →ₗ[R] γ) (g : α →ₗ[R] β) :
f.mapMatrix.comp g.mapMatrix = ((f.comp g).mapMatrix : Matrix m n α →ₗ[R] _) :=
rfl
@[simp] lemma entryLinearMap_comp_mapMatrix (f : α →ₗ[R] β) (i : m) (j : n) :
entryLinearMap R _ i j ∘ₗ f.mapMatrix = f ∘ₗ entryLinearMap R _ i j := rfl
end LinearMap
namespace LinearEquiv
variable [Semiring R] [AddCommMonoid α] [AddCommMonoid β] [AddCommMonoid γ]
variable [Module R α] [Module R β] [Module R γ]
/-- The `LinearEquiv` between spaces of matrices induced by a `LinearEquiv` between their
coefficients. This is `Matrix.map` as a `LinearEquiv`. -/
@[simps apply]
def mapMatrix (f : α ≃ₗ[R] β) : Matrix m n α ≃ₗ[R] Matrix m n β :=
{ f.toEquiv.mapMatrix,
f.toLinearMap.mapMatrix with
toFun := fun M => M.map f
invFun := fun M => M.map f.symm }
@[simp]
theorem mapMatrix_refl : (LinearEquiv.refl R α).mapMatrix = LinearEquiv.refl R (Matrix m n α) :=
rfl
@[simp]
theorem mapMatrix_symm (f : α ≃ₗ[R] β) :
f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m n β ≃ₗ[R] _) :=
rfl
@[simp]
theorem mapMatrix_trans (f : α ≃ₗ[R] β) (g : β ≃ₗ[R] γ) :
f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m n α ≃ₗ[R] _) :=
rfl
@[simp] lemma mapMatrix_toLinearMap (f : α ≃ₗ[R] β) :
(f.mapMatrix : _ ≃ₗ[R] Matrix m n β).toLinearMap = f.toLinearMap.mapMatrix := by
rfl
@[simp] lemma entryLinearMap_comp_mapMatrix (f : α ≃ₗ[R] β) (i : m) (j : n) :
entryLinearMap R _ i j ∘ₗ f.mapMatrix.toLinearMap =
f.toLinearMap ∘ₗ entryLinearMap R _ i j := by
simp only [mapMatrix_toLinearMap, LinearMap.entryLinearMap_comp_mapMatrix]
end LinearEquiv
namespace RingHom
variable [Fintype m] [DecidableEq m]
variable [NonAssocSemiring α] [NonAssocSemiring β] [NonAssocSemiring γ]
/-- The `RingHom` between spaces of square matrices induced by a `RingHom` between their
coefficients. This is `Matrix.map` as a `RingHom`. -/
@[simps]
def mapMatrix (f : α →+* β) : Matrix m m α →+* Matrix m m β :=
{ f.toAddMonoidHom.mapMatrix with
toFun := fun M => M.map f
map_one' := by simp
map_mul' := fun _ _ => Matrix.map_mul }
@[simp]
theorem mapMatrix_id : (RingHom.id α).mapMatrix = RingHom.id (Matrix m m α) :=
rfl
@[simp]
theorem mapMatrix_comp (f : β →+* γ) (g : α →+* β) :
f.mapMatrix.comp g.mapMatrix = ((f.comp g).mapMatrix : Matrix m m α →+* _) :=
rfl
end RingHom
namespace RingEquiv
variable [Fintype m] [DecidableEq m]
variable [NonAssocSemiring α] [NonAssocSemiring β] [NonAssocSemiring γ]
/-- The `RingEquiv` between spaces of square matrices induced by a `RingEquiv` between their
coefficients. This is `Matrix.map` as a `RingEquiv`. -/
@[simps apply]
def mapMatrix (f : α ≃+* β) : Matrix m m α ≃+* Matrix m m β :=
{ f.toRingHom.mapMatrix,
f.toAddEquiv.mapMatrix with
toFun := fun M => M.map f
invFun := fun M => M.map f.symm }
@[simp]
theorem mapMatrix_refl : (RingEquiv.refl α).mapMatrix = RingEquiv.refl (Matrix m m α) :=
rfl
@[simp]
theorem mapMatrix_symm (f : α ≃+* β) : f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m m β ≃+* _) :=
rfl
@[simp]
theorem mapMatrix_trans (f : α ≃+* β) (g : β ≃+* γ) :
f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m m α ≃+* _) :=
rfl
open MulOpposite in
/--
For any ring `R`, we have ring isomorphism `Matₙₓₙ(Rᵒᵖ) ≅ (Matₙₓₙ(R))ᵒᵖ` given by transpose.
-/
@[simps apply symm_apply]
def mopMatrix : Matrix m m αᵐᵒᵖ ≃+* (Matrix m m α)ᵐᵒᵖ where
toFun M := op (M.transpose.map unop)
invFun M := M.unop.transpose.map op
left_inv _ := by aesop
right_inv _ := by aesop
map_mul' _ _ := unop_injective <| by ext; simp [transpose, mul_apply]
map_add' _ _ := by aesop
end RingEquiv
namespace AlgHom
variable [Fintype m] [DecidableEq m]
variable [CommSemiring R] [Semiring α] [Semiring β] [Semiring γ]
variable [Algebra R α] [Algebra R β] [Algebra R γ]
/-- The `AlgHom` between spaces of square matrices induced by an `AlgHom` between their
coefficients. This is `Matrix.map` as an `AlgHom`. -/
@[simps]
def mapMatrix (f : α →ₐ[R] β) : Matrix m m α →ₐ[R] Matrix m m β :=
{ f.toRingHom.mapMatrix with
toFun := fun M => M.map f
commutes' := fun r => Matrix.map_algebraMap r f (map_zero _) (f.commutes r) }
@[simp]
theorem mapMatrix_id : (AlgHom.id R α).mapMatrix = AlgHom.id R (Matrix m m α) :=
rfl
@[simp]
theorem mapMatrix_comp (f : β →ₐ[R] γ) (g : α →ₐ[R] β) :
f.mapMatrix.comp g.mapMatrix = ((f.comp g).mapMatrix : Matrix m m α →ₐ[R] _) :=
rfl
end AlgHom
namespace AlgEquiv
variable [Fintype m] [DecidableEq m]
variable [CommSemiring R] [Semiring α] [Semiring β] [Semiring γ]
variable [Algebra R α] [Algebra R β] [Algebra R γ]
/-- The `AlgEquiv` between spaces of square matrices induced by an `AlgEquiv` between their
coefficients. This is `Matrix.map` as an `AlgEquiv`. -/
@[simps apply]
def mapMatrix (f : α ≃ₐ[R] β) : Matrix m m α ≃ₐ[R] Matrix m m β :=
{ f.toAlgHom.mapMatrix,
f.toRingEquiv.mapMatrix with
toFun := fun M => M.map f
invFun := fun M => M.map f.symm }
@[simp]
theorem mapMatrix_refl : AlgEquiv.refl.mapMatrix = (AlgEquiv.refl : Matrix m m α ≃ₐ[R] _) :=
rfl
@[simp]
theorem mapMatrix_symm (f : α ≃ₐ[R] β) :
f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m m β ≃ₐ[R] _) :=
rfl
@[simp]
theorem mapMatrix_trans (f : α ≃ₐ[R] β) (g : β ≃ₐ[R] γ) :
f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m m α ≃ₐ[R] _) :=
rfl
/-- For any algebra `α` over a ring `R`, we have an `R`-algebra isomorphism
`Matₙₓₙ(αᵒᵖ) ≅ (Matₙₓₙ(R))ᵒᵖ` given by transpose. If `α` is commutative,
we can get rid of the `ᵒᵖ` in the left-hand side, see `Matrix.transposeAlgEquiv`. -/
@[simps!] def mopMatrix : Matrix m m αᵐᵒᵖ ≃ₐ[R] (Matrix m m α)ᵐᵒᵖ where
__ := RingEquiv.mopMatrix
commutes' _ := MulOpposite.unop_injective <| by
ext; simp [algebraMap_matrix_apply, eq_comm, apply_ite MulOpposite.unop]
end AlgEquiv
open Matrix
namespace Matrix
section Transpose
open Matrix
variable (m n α)
/-- `Matrix.transpose` as an `AddEquiv` -/
@[simps apply]
def transposeAddEquiv [Add α] : Matrix m n α ≃+ Matrix n m α where
toFun := transpose
invFun := transpose
left_inv := transpose_transpose
right_inv := transpose_transpose
map_add' := transpose_add
@[simp]
theorem transposeAddEquiv_symm [Add α] : (transposeAddEquiv m n α).symm = transposeAddEquiv n m α :=
rfl
variable {m n α}
theorem transpose_list_sum [AddMonoid α] (l : List (Matrix m n α)) :
l.sumᵀ = (l.map transpose).sum :=
map_list_sum (transposeAddEquiv m n α) l
theorem transpose_multiset_sum [AddCommMonoid α] (s : Multiset (Matrix m n α)) :
s.sumᵀ = (s.map transpose).sum :=
(transposeAddEquiv m n α).toAddMonoidHom.map_multiset_sum s
theorem transpose_sum [AddCommMonoid α] {ι : Type*} (s : Finset ι) (M : ι → Matrix m n α) :
(∑ i ∈ s, M i)ᵀ = ∑ i ∈ s, (M i)ᵀ :=
map_sum (transposeAddEquiv m n α) _ s
variable (m n R α)
/-- `Matrix.transpose` as a `LinearMap` -/
@[simps apply]
def transposeLinearEquiv [Semiring R] [AddCommMonoid α] [Module R α] :
Matrix m n α ≃ₗ[R] Matrix n m α :=
{ transposeAddEquiv m n α with map_smul' := transpose_smul }
@[simp]
theorem transposeLinearEquiv_symm [Semiring R] [AddCommMonoid α] [Module R α] :
(transposeLinearEquiv m n R α).symm = transposeLinearEquiv n m R α :=
rfl
variable {m n R α}
variable (m α)
/-- `Matrix.transpose` as a `RingEquiv` to the opposite ring -/
@[simps]
def transposeRingEquiv [AddCommMonoid α] [CommSemigroup α] [Fintype m] :
Matrix m m α ≃+* (Matrix m m α)ᵐᵒᵖ :=
{ (transposeAddEquiv m m α).trans MulOpposite.opAddEquiv with
toFun := fun M => MulOpposite.op Mᵀ
invFun := fun M => M.unopᵀ
map_mul' := fun M N =>
(congr_arg MulOpposite.op (transpose_mul M N)).trans (MulOpposite.op_mul _ _)
left_inv := fun M => transpose_transpose M
right_inv := fun M => MulOpposite.unop_injective <| transpose_transpose M.unop }
variable {m α}
@[simp]
theorem transpose_pow [CommSemiring α] [Fintype m] [DecidableEq m] (M : Matrix m m α) (k : ℕ) :
(M ^ k)ᵀ = Mᵀ ^ k :=
MulOpposite.op_injective <| map_pow (transposeRingEquiv m α) M k
theorem transpose_list_prod [CommSemiring α] [Fintype m] [DecidableEq m] (l : List (Matrix m m α)) :
l.prodᵀ = (l.map transpose).reverse.prod :=
(transposeRingEquiv m α).unop_map_list_prod l
variable (R m α)
/-- `Matrix.transpose` as an `AlgEquiv` to the opposite ring -/
@[simps]
def transposeAlgEquiv [CommSemiring R] [CommSemiring α] [Fintype m] [DecidableEq m] [Algebra R α] :
Matrix m m α ≃ₐ[R] (Matrix m m α)ᵐᵒᵖ :=
{ (transposeAddEquiv m m α).trans MulOpposite.opAddEquiv,
transposeRingEquiv m α with
toFun := fun M => MulOpposite.op Mᵀ
commutes' := fun r => by
simp only [algebraMap_eq_diagonal, diagonal_transpose, MulOpposite.algebraMap_apply] }
variable {R m α}
end Transpose
end Matrix
| Mathlib/Data/Matrix/Basic.lean | 1,965 | 1,967 | |
/-
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.Subalgebra
import Mathlib.LinearAlgebra.Finsupp.Span
/-!
# Lie submodules of a Lie algebra
In this file we define Lie submodules, we construct the lattice structure on Lie submodules and we
use it to define various important operations, notably the Lie span of a subset of a Lie module.
## Main definitions
* `LieSubmodule`
* `LieSubmodule.wellFounded_of_noetherian`
* `LieSubmodule.lieSpan`
* `LieSubmodule.map`
* `LieSubmodule.comap`
## Tags
lie algebra, lie submodule, lie ideal, lattice structure
-/
universe u v w w₁ w₂
section LieSubmodule
variable (R : Type u) (L : Type v) (M : Type w)
variable [CommRing R] [LieRing L] [AddCommGroup M] [Module R M]
variable [LieRingModule L M]
/-- A Lie submodule of a Lie module is a submodule that is closed under the Lie bracket.
This is a sufficient condition for the subset itself to form a Lie module. -/
structure LieSubmodule extends Submodule R M where
lie_mem : ∀ {x : L} {m : M}, m ∈ carrier → ⁅x, m⁆ ∈ carrier
attribute [nolint docBlame] LieSubmodule.toSubmodule
attribute [coe] LieSubmodule.toSubmodule
namespace LieSubmodule
variable {R L M}
variable (N N' : LieSubmodule R L M)
instance : SetLike (LieSubmodule R L M) M where
coe s := s.carrier
coe_injective' N O h := by cases N; cases O; congr; exact SetLike.coe_injective' h
instance : AddSubgroupClass (LieSubmodule R L M) M where
add_mem {N} _ _ := N.add_mem'
zero_mem N := N.zero_mem'
neg_mem {N} x hx := show -x ∈ N.toSubmodule from neg_mem hx
instance instSMulMemClass : SMulMemClass (LieSubmodule R L M) R M where
smul_mem {s} c _ h := s.smul_mem' c h
/-- The zero module is a Lie submodule of any Lie module. -/
instance : Zero (LieSubmodule R L M) :=
⟨{ (0 : Submodule R M) with
lie_mem := fun {x m} h ↦ by rw [(Submodule.mem_bot R).1 h]; apply lie_zero }⟩
instance : Inhabited (LieSubmodule R L M) :=
⟨0⟩
instance (priority := high) coeSort : CoeSort (LieSubmodule R L M) (Type w) where
coe N := { x : M // x ∈ N }
instance (priority := mid) coeSubmodule : CoeOut (LieSubmodule R L M) (Submodule R M) :=
⟨toSubmodule⟩
instance : CanLift (Submodule R M) (LieSubmodule R L M) (·)
(fun N ↦ ∀ {x : L} {m : M}, m ∈ N → ⁅x, m⁆ ∈ N) where
prf N hN := ⟨⟨N, hN⟩, rfl⟩
@[norm_cast]
theorem coe_toSubmodule : ((N : Submodule R M) : Set M) = N :=
rfl
theorem mem_carrier {x : M} : x ∈ N.carrier ↔ x ∈ (N : Set M) :=
Iff.rfl
theorem mem_mk_iff (S : Set M) (h₁ h₂ h₃ h₄) {x : M} :
x ∈ (⟨⟨⟨⟨S, h₁⟩, h₂⟩, h₃⟩, h₄⟩ : LieSubmodule R L M) ↔ x ∈ S :=
Iff.rfl
@[simp]
theorem mem_mk_iff' (p : Submodule R M) (h) {x : M} :
x ∈ (⟨p, h⟩ : LieSubmodule R L M) ↔ x ∈ p :=
Iff.rfl
@[simp]
theorem mem_toSubmodule {x : M} : x ∈ (N : Submodule R M) ↔ x ∈ N :=
Iff.rfl
@[deprecated (since := "2024-12-30")] alias mem_coeSubmodule := mem_toSubmodule
theorem mem_coe {x : M} : x ∈ (N : Set M) ↔ x ∈ N :=
Iff.rfl
@[simp]
protected theorem zero_mem : (0 : M) ∈ N :=
zero_mem N
@[simp]
theorem mk_eq_zero {x} (h : x ∈ N) : (⟨x, h⟩ : N) = 0 ↔ x = 0 :=
Subtype.ext_iff_val
@[simp]
theorem coe_toSet_mk (S : Set M) (h₁ h₂ h₃ h₄) :
((⟨⟨⟨⟨S, h₁⟩, h₂⟩, h₃⟩, h₄⟩ : LieSubmodule R L M) : Set M) = S :=
rfl
theorem toSubmodule_mk (p : Submodule R M) (h) :
(({ p with lie_mem := h } : LieSubmodule R L M) : Submodule R M) = p := by cases p; rfl
@[deprecated (since := "2024-12-30")] alias coe_toSubmodule_mk := toSubmodule_mk
theorem toSubmodule_injective :
Function.Injective (toSubmodule : LieSubmodule R L M → Submodule R M) := fun x y h ↦ by
cases x; cases y; congr
@[deprecated (since := "2024-12-30")] alias coeSubmodule_injective := toSubmodule_injective
@[ext]
theorem ext (h : ∀ m, m ∈ N ↔ m ∈ N') : N = N' :=
SetLike.ext h
@[simp]
theorem toSubmodule_inj : (N : Submodule R M) = (N' : Submodule R M) ↔ N = N' :=
toSubmodule_injective.eq_iff
@[deprecated (since := "2024-12-30")] alias coe_toSubmodule_inj := toSubmodule_inj
@[deprecated (since := "2024-12-29")] alias toSubmodule_eq_iff := toSubmodule_inj
/-- Copy of a `LieSubmodule` with a new `carrier` equal to the old one. Useful to fix definitional
equalities. -/
protected def copy (s : Set M) (hs : s = ↑N) : LieSubmodule R L M where
carrier := s
zero_mem' := by simp [hs]
add_mem' x y := by rw [hs] at x y ⊢; exact N.add_mem' x y
smul_mem' := by exact hs.symm ▸ N.smul_mem'
lie_mem := by exact hs.symm ▸ N.lie_mem
@[simp]
theorem coe_copy (S : LieSubmodule R L M) (s : Set M) (hs : s = ↑S) : (S.copy s hs : Set M) = s :=
rfl
theorem copy_eq (S : LieSubmodule R L M) (s : Set M) (hs : s = ↑S) : S.copy s hs = S :=
SetLike.coe_injective hs
instance : LieRingModule L N where
bracket (x : L) (m : N) := ⟨⁅x, m.val⁆, N.lie_mem m.property⟩
add_lie := by intro x y m; apply SetCoe.ext; apply add_lie
lie_add := by intro x m n; apply SetCoe.ext; apply lie_add
leibniz_lie := by intro x y m; apply SetCoe.ext; apply leibniz_lie
@[simp, norm_cast]
theorem coe_zero : ((0 : N) : M) = (0 : M) :=
rfl
@[simp, norm_cast]
theorem coe_add (m m' : N) : (↑(m + m') : M) = (m : M) + (m' : M) :=
rfl
@[simp, norm_cast]
theorem coe_neg (m : N) : (↑(-m) : M) = -(m : M) :=
rfl
@[simp, norm_cast]
theorem coe_sub (m m' : N) : (↑(m - m') : M) = (m : M) - (m' : M) :=
rfl
@[simp, norm_cast]
theorem coe_smul (t : R) (m : N) : (↑(t • m) : M) = t • (m : M) :=
rfl
@[simp, norm_cast]
theorem coe_bracket (x : L) (m : N) :
(↑⁅x, m⁆ : M) = ⁅x, ↑m⁆ :=
rfl
-- Copying instances from `Submodule` for correct discrimination keys
instance [IsNoetherian R M] (N : LieSubmodule R L M) : IsNoetherian R N :=
inferInstanceAs <| IsNoetherian R N.toSubmodule
instance [IsArtinian R M] (N : LieSubmodule R L M) : IsArtinian R N :=
inferInstanceAs <| IsArtinian R N.toSubmodule
instance [NoZeroSMulDivisors R M] : NoZeroSMulDivisors R N :=
inferInstanceAs <| NoZeroSMulDivisors R N.toSubmodule
variable [LieAlgebra R L] [LieModule R L M]
instance instLieModule : LieModule R L N where
lie_smul := by intro t x y; apply SetCoe.ext; apply lie_smul
smul_lie := by intro t x y; apply SetCoe.ext; apply smul_lie
instance [Subsingleton M] : Unique (LieSubmodule R L M) :=
⟨⟨0⟩, fun _ ↦ (toSubmodule_inj _ _).mp (Subsingleton.elim _ _)⟩
end LieSubmodule
variable {R M}
theorem Submodule.exists_lieSubmodule_coe_eq_iff (p : Submodule R M) :
(∃ N : LieSubmodule R L M, ↑N = p) ↔ ∀ (x : L) (m : M), m ∈ p → ⁅x, m⁆ ∈ p := by
constructor
· rintro ⟨N, rfl⟩ _ _; exact N.lie_mem
· intro h; use { p with lie_mem := @h }
namespace LieSubalgebra
variable {L}
variable [LieAlgebra R L]
variable (K : LieSubalgebra R L)
/-- Given a Lie subalgebra `K ⊆ L`, if we view `L` as a `K`-module by restriction, it contains
a distinguished Lie submodule for the action of `K`, namely `K` itself. -/
def toLieSubmodule : LieSubmodule R K L :=
{ (K : Submodule R L) with lie_mem := fun {x _} hy ↦ K.lie_mem x.property hy }
@[simp]
theorem coe_toLieSubmodule : (K.toLieSubmodule : Submodule R L) = K := rfl
variable {K}
@[simp]
theorem mem_toLieSubmodule (x : L) : x ∈ K.toLieSubmodule ↔ x ∈ K :=
Iff.rfl
end LieSubalgebra
end LieSubmodule
namespace LieSubmodule
variable {R : Type u} {L : Type v} {M : Type w}
variable [CommRing R] [LieRing L] [AddCommGroup M] [Module R M]
variable [LieRingModule L M]
variable (N N' : LieSubmodule R L M)
section LatticeStructure
open Set
theorem coe_injective : Function.Injective ((↑) : LieSubmodule R L M → Set M) :=
SetLike.coe_injective
@[simp, norm_cast]
theorem toSubmodule_le_toSubmodule : (N : Submodule R M) ≤ N' ↔ N ≤ N' :=
Iff.rfl
@[deprecated (since := "2024-12-30")]
alias coeSubmodule_le_coeSubmodule := toSubmodule_le_toSubmodule
instance : Bot (LieSubmodule R L M) :=
⟨0⟩
instance instUniqueBot : Unique (⊥ : LieSubmodule R L M) :=
inferInstanceAs <| Unique (⊥ : Submodule R M)
@[simp]
theorem bot_coe : ((⊥ : LieSubmodule R L M) : Set M) = {0} :=
rfl
@[simp]
theorem bot_toSubmodule : ((⊥ : LieSubmodule R L M) : Submodule R M) = ⊥ :=
rfl
@[deprecated (since := "2024-12-30")] alias bot_coeSubmodule := bot_toSubmodule
@[simp]
theorem toSubmodule_eq_bot : (N : Submodule R M) = ⊥ ↔ N = ⊥ := by
rw [← toSubmodule_inj, bot_toSubmodule]
@[deprecated (since := "2024-12-30")] alias coeSubmodule_eq_bot_iff := toSubmodule_eq_bot
@[simp] theorem mk_eq_bot_iff {N : Submodule R M} {h} :
(⟨N, h⟩ : LieSubmodule R L M) = ⊥ ↔ N = ⊥ := by
rw [← toSubmodule_inj, bot_toSubmodule]
@[simp]
theorem mem_bot (x : M) : x ∈ (⊥ : LieSubmodule R L M) ↔ x = 0 :=
mem_singleton_iff
instance : Top (LieSubmodule R L M) :=
⟨{ (⊤ : Submodule R M) with lie_mem := fun {x m} _ ↦ mem_univ ⁅x, m⁆ }⟩
@[simp]
theorem top_coe : ((⊤ : LieSubmodule R L M) : Set M) = univ :=
rfl
@[simp]
theorem top_toSubmodule : ((⊤ : LieSubmodule R L M) : Submodule R M) = ⊤ :=
rfl
@[deprecated (since := "2024-12-30")] alias top_coeSubmodule := top_toSubmodule
@[simp]
theorem toSubmodule_eq_top : (N : Submodule R M) = ⊤ ↔ N = ⊤ := by
rw [← toSubmodule_inj, top_toSubmodule]
@[deprecated (since := "2024-12-30")] alias coeSubmodule_eq_top_iff := toSubmodule_eq_top
@[simp] theorem mk_eq_top_iff {N : Submodule R M} {h} :
(⟨N, h⟩ : LieSubmodule R L M) = ⊤ ↔ N = ⊤ := by
rw [← toSubmodule_inj, top_toSubmodule]
@[simp]
theorem mem_top (x : M) : x ∈ (⊤ : LieSubmodule R L M) :=
mem_univ x
instance : Min (LieSubmodule R L M) :=
⟨fun N N' ↦
{ (N ⊓ N' : Submodule R M) with
lie_mem := fun h ↦ mem_inter (N.lie_mem h.1) (N'.lie_mem h.2) }⟩
instance : InfSet (LieSubmodule R L M) :=
⟨fun S ↦
{ toSubmodule := sInf {(s : Submodule R M) | s ∈ S}
lie_mem := fun {x m} h ↦ by
simp only [Submodule.mem_carrier, mem_iInter, Submodule.sInf_coe, mem_setOf_eq,
forall_apply_eq_imp_iff₂, forall_exists_index, and_imp] at h ⊢
intro N hN; apply N.lie_mem (h N hN) }⟩
@[simp]
theorem inf_coe : (↑(N ⊓ N') : Set M) = ↑N ∩ ↑N' :=
rfl
@[norm_cast, simp]
theorem inf_toSubmodule :
(↑(N ⊓ N') : Submodule R M) = (N : Submodule R M) ⊓ (N' : Submodule R M) :=
rfl
@[deprecated (since := "2024-12-30")] alias inf_coe_toSubmodule := inf_toSubmodule
@[simp]
theorem sInf_toSubmodule (S : Set (LieSubmodule R L M)) :
(↑(sInf S) : Submodule R M) = sInf {(s : Submodule R M) | s ∈ S} :=
rfl
@[deprecated (since := "2024-12-30")] alias sInf_coe_toSubmodule := sInf_toSubmodule
theorem sInf_toSubmodule_eq_iInf (S : Set (LieSubmodule R L M)) :
(↑(sInf S) : Submodule R M) = ⨅ N ∈ S, (N : Submodule R M) := by
rw [sInf_toSubmodule, ← Set.image, sInf_image]
@[deprecated (since := "2024-12-30")] alias sInf_coe_toSubmodule' := sInf_toSubmodule_eq_iInf
@[simp]
theorem iInf_toSubmodule {ι} (p : ι → LieSubmodule R L M) :
(↑(⨅ i, p i) : Submodule R M) = ⨅ i, (p i : Submodule R M) := by
rw [iInf, sInf_toSubmodule]; ext; simp
@[deprecated (since := "2024-12-30")] alias iInf_coe_toSubmodule := iInf_toSubmodule
@[simp]
theorem sInf_coe (S : Set (LieSubmodule R L M)) : (↑(sInf S) : Set M) = ⋂ s ∈ S, (s : Set M) := by
rw [← LieSubmodule.coe_toSubmodule, sInf_toSubmodule, Submodule.sInf_coe]
ext m
simp only [mem_iInter, mem_setOf_eq, forall_apply_eq_imp_iff₂, exists_imp,
and_imp, SetLike.mem_coe, mem_toSubmodule]
@[simp]
theorem iInf_coe {ι} (p : ι → LieSubmodule R L M) : (↑(⨅ i, p i) : Set M) = ⋂ i, ↑(p i) := by
rw [iInf, sInf_coe]; simp only [Set.mem_range, Set.iInter_exists, Set.iInter_iInter_eq']
@[simp]
theorem mem_iInf {ι} (p : ι → LieSubmodule R L M) {x} : (x ∈ ⨅ i, p i) ↔ ∀ i, x ∈ p i := by
rw [← SetLike.mem_coe, iInf_coe, Set.mem_iInter]; rfl
instance : Max (LieSubmodule R L M) where
max N N' :=
{ toSubmodule := (N : Submodule R M) ⊔ (N' : Submodule R M)
lie_mem := by
rintro x m (hm : m ∈ (N : Submodule R M) ⊔ (N' : Submodule R M))
change ⁅x, m⁆ ∈ (N : Submodule R M) ⊔ (N' : Submodule R M)
rw [Submodule.mem_sup] at hm ⊢
obtain ⟨y, hy, z, hz, rfl⟩ := hm
exact ⟨⁅x, y⁆, N.lie_mem hy, ⁅x, z⁆, N'.lie_mem hz, (lie_add _ _ _).symm⟩ }
instance : SupSet (LieSubmodule R L M) where
sSup S :=
{ toSubmodule := sSup {(p : Submodule R M) | p ∈ S}
lie_mem := by
intro x m (hm : m ∈ sSup {(p : Submodule R M) | p ∈ S})
change ⁅x, m⁆ ∈ sSup {(p : Submodule R M) | p ∈ S}
obtain ⟨s, hs, hsm⟩ := Submodule.mem_sSup_iff_exists_finset.mp hm
clear hm
classical
induction s using Finset.induction_on generalizing m with
| empty =>
replace hsm : m = 0 := by simpa using hsm
simp [hsm]
| insert q t hqt ih =>
rw [Finset.iSup_insert] at hsm
obtain ⟨m', hm', u, hu, rfl⟩ := Submodule.mem_sup.mp hsm
rw [lie_add]
refine add_mem ?_ (ih (Subset.trans (by simp) hs) hu)
obtain ⟨p, hp, rfl⟩ : ∃ p ∈ S, ↑p = q := hs (Finset.mem_insert_self q t)
suffices p ≤ sSup {(p : Submodule R M) | p ∈ S} by exact this (p.lie_mem hm')
exact le_sSup ⟨p, hp, rfl⟩ }
@[norm_cast, simp]
theorem sup_toSubmodule :
(↑(N ⊔ N') : Submodule R M) = (N : Submodule R M) ⊔ (N' : Submodule R M) := by
rfl
@[deprecated (since := "2024-12-30")] alias sup_coe_toSubmodule := sup_toSubmodule
@[simp]
theorem sSup_toSubmodule (S : Set (LieSubmodule R L M)) :
(↑(sSup S) : Submodule R M) = sSup {(s : Submodule R M) | s ∈ S} :=
rfl
@[deprecated (since := "2024-12-30")] alias sSup_coe_toSubmodule := sSup_toSubmodule
theorem sSup_toSubmodule_eq_iSup (S : Set (LieSubmodule R L M)) :
(↑(sSup S) : Submodule R M) = ⨆ N ∈ S, (N : Submodule R M) := by
rw [sSup_toSubmodule, ← Set.image, sSup_image]
@[deprecated (since := "2024-12-30")] alias sSup_coe_toSubmodule' := sSup_toSubmodule_eq_iSup
@[simp]
theorem iSup_toSubmodule {ι} (p : ι → LieSubmodule R L M) :
(↑(⨆ i, p i) : Submodule R M) = ⨆ i, (p i : Submodule R M) := by
rw [iSup, sSup_toSubmodule]; ext; simp [Submodule.mem_sSup, Submodule.mem_iSup]
@[deprecated (since := "2024-12-30")] alias iSup_coe_toSubmodule := iSup_toSubmodule
/-- The set of Lie submodules of a Lie module form a complete lattice. -/
instance : CompleteLattice (LieSubmodule R L M) :=
{ toSubmodule_injective.completeLattice toSubmodule sup_toSubmodule inf_toSubmodule
sSup_toSubmodule_eq_iSup sInf_toSubmodule_eq_iInf rfl rfl with
toPartialOrder := SetLike.instPartialOrder }
theorem mem_iSup_of_mem {ι} {b : M} {N : ι → LieSubmodule R L M} (i : ι) (h : b ∈ N i) :
b ∈ ⨆ i, N i :=
(le_iSup N i) h
@[elab_as_elim]
lemma iSup_induction {ι} (N : ι → LieSubmodule R L M) {motive : M → Prop} {x : M}
(hx : x ∈ ⨆ i, N i) (mem : ∀ i, ∀ y ∈ N i, motive y) (zero : motive 0)
(add : ∀ y z, motive y → motive z → motive (y + z)) : motive x := by
rw [← LieSubmodule.mem_toSubmodule, LieSubmodule.iSup_toSubmodule] at hx
exact Submodule.iSup_induction (motive := motive) (fun i ↦ (N i : Submodule R M)) hx mem zero add
@[elab_as_elim]
theorem iSup_induction' {ι} (N : ι → LieSubmodule R L M) {motive : (x : M) → (x ∈ ⨆ i, N i) → Prop}
(mem : ∀ (i) (x) (hx : x ∈ N i), motive x (mem_iSup_of_mem i hx)) (zero : motive 0 (zero_mem _))
(add : ∀ x y hx hy, motive x hx → motive y hy → motive (x + y) (add_mem ‹_› ‹_›)) {x : M}
(hx : x ∈ ⨆ i, N i) : motive x hx := by
refine Exists.elim ?_ fun (hx : x ∈ ⨆ i, N i) (hc : motive x hx) => hc
refine iSup_induction N (motive := fun x : M ↦ ∃ (hx : x ∈ ⨆ i, N i), motive x hx) hx
(fun i x hx => ?_) ?_ fun x y => ?_
· exact ⟨_, mem _ _ hx⟩
· exact ⟨_, zero⟩
· rintro ⟨_, Cx⟩ ⟨_, Cy⟩
exact ⟨_, add _ _ _ _ Cx Cy⟩
variable {N N'}
@[simp] lemma disjoint_toSubmodule :
Disjoint (N : Submodule R M) (N' : Submodule R M) ↔ Disjoint N N' := by
rw [disjoint_iff, disjoint_iff, ← toSubmodule_inj, inf_toSubmodule, bot_toSubmodule,
← disjoint_iff]
@[deprecated disjoint_toSubmodule (since := "2025-04-03")]
theorem disjoint_iff_toSubmodule :
Disjoint N N' ↔ Disjoint (N : Submodule R M) (N' : Submodule R M) := disjoint_toSubmodule.symm
@[deprecated (since := "2024-12-30")] alias disjoint_iff_coe_toSubmodule := disjoint_iff_toSubmodule
@[simp] lemma codisjoint_toSubmodule :
Codisjoint (N : Submodule R M) (N' : Submodule R M) ↔ Codisjoint N N' := by
rw [codisjoint_iff, codisjoint_iff, ← toSubmodule_inj, sup_toSubmodule,
top_toSubmodule, ← codisjoint_iff]
@[deprecated codisjoint_toSubmodule (since := "2025-04-03")]
theorem codisjoint_iff_toSubmodule :
Codisjoint N N' ↔ Codisjoint (N : Submodule R M) (N' : Submodule R M) :=
codisjoint_toSubmodule.symm
@[deprecated (since := "2024-12-30")]
alias codisjoint_iff_coe_toSubmodule := codisjoint_iff_toSubmodule
@[simp] lemma isCompl_toSubmodule :
IsCompl (N : Submodule R M) (N' : Submodule R M) ↔ IsCompl N N' := by
simp [isCompl_iff]
@[deprecated isCompl_toSubmodule (since := "2025-04-03")]
theorem isCompl_iff_toSubmodule :
IsCompl N N' ↔ IsCompl (N : Submodule R M) (N' : Submodule R M) := isCompl_toSubmodule.symm
@[deprecated (since := "2024-12-30")] alias isCompl_iff_coe_toSubmodule := isCompl_iff_toSubmodule
@[simp] lemma iSupIndep_toSubmodule {ι : Type*} {N : ι → LieSubmodule R L M} :
iSupIndep (fun i ↦ (N i : Submodule R M)) ↔ iSupIndep N := by
simp [iSupIndep_def, ← disjoint_toSubmodule]
@[deprecated iSupIndep_toSubmodule (since := "2025-04-03")]
theorem iSupIndep_iff_toSubmodule {ι : Type*} {N : ι → LieSubmodule R L M} :
iSupIndep N ↔ iSupIndep fun i ↦ (N i : Submodule R M) := iSupIndep_toSubmodule.symm
@[deprecated (since := "2024-12-30")]
alias iSupIndep_iff_coe_toSubmodule := iSupIndep_iff_toSubmodule
@[deprecated (since := "2024-11-24")]
alias independent_iff_toSubmodule := iSupIndep_iff_toSubmodule
@[deprecated (since := "2024-12-30")]
alias independent_iff_coe_toSubmodule := independent_iff_toSubmodule
@[simp] lemma iSup_toSubmodule_eq_top {ι : Sort*} {N : ι → LieSubmodule R L M} :
⨆ i, (N i : Submodule R M) = ⊤ ↔ ⨆ i, N i = ⊤ := by
rw [← iSup_toSubmodule, ← top_toSubmodule (L := L), toSubmodule_inj]
@[deprecated iSup_toSubmodule_eq_top (since := "2025-04-03")]
theorem iSup_eq_top_iff_toSubmodule {ι : Sort*} {N : ι → LieSubmodule R L M} :
⨆ i, N i = ⊤ ↔ ⨆ i, (N i : Submodule R M) = ⊤ := iSup_toSubmodule_eq_top.symm
@[deprecated (since := "2024-12-30")]
alias iSup_eq_top_iff_coe_toSubmodule := iSup_eq_top_iff_toSubmodule
instance : Add (LieSubmodule R L M) where add := max
instance : Zero (LieSubmodule R L M) where zero := ⊥
instance : AddCommMonoid (LieSubmodule R L M) where
add_assoc := sup_assoc
zero_add := bot_sup_eq
add_zero := sup_bot_eq
add_comm := sup_comm
nsmul := nsmulRec
variable (N N')
@[simp]
theorem add_eq_sup : N + N' = N ⊔ N' :=
rfl
@[simp]
theorem mem_inf (x : M) : x ∈ N ⊓ N' ↔ x ∈ N ∧ x ∈ N' := by
rw [← mem_toSubmodule, ← mem_toSubmodule, ← mem_toSubmodule, inf_toSubmodule,
Submodule.mem_inf]
theorem mem_sup (x : M) : x ∈ N ⊔ N' ↔ ∃ y ∈ N, ∃ z ∈ N', y + z = x := by
rw [← mem_toSubmodule, sup_toSubmodule, Submodule.mem_sup]; exact Iff.rfl
nonrec theorem eq_bot_iff : N = ⊥ ↔ ∀ m : M, m ∈ N → m = 0 := by rw [eq_bot_iff]; exact Iff.rfl
instance subsingleton_of_bot : Subsingleton (LieSubmodule R L (⊥ : LieSubmodule R L M)) := by
apply subsingleton_of_bot_eq_top
ext ⟨_, hx⟩
simp only [mem_bot, mk_eq_zero, mem_top, iff_true]
exact hx
instance : IsModularLattice (LieSubmodule R L M) where
sup_inf_le_assoc_of_le _ _ := by
simp only [← toSubmodule_le_toSubmodule, sup_toSubmodule, inf_toSubmodule]
exact IsModularLattice.sup_inf_le_assoc_of_le _
variable (R L M)
/-- The natural functor that forgets the action of `L` as an order embedding. -/
@[simps] def toSubmodule_orderEmbedding : LieSubmodule R L M ↪o Submodule R M :=
{ toFun := (↑)
inj' := toSubmodule_injective
map_rel_iff' := Iff.rfl }
instance wellFoundedGT_of_noetherian [IsNoetherian R M] : WellFoundedGT (LieSubmodule R L M) :=
RelHomClass.isWellFounded (toSubmodule_orderEmbedding R L M).dual.ltEmbedding
theorem wellFoundedLT_of_isArtinian [IsArtinian R M] : WellFoundedLT (LieSubmodule R L M) :=
RelHomClass.isWellFounded (toSubmodule_orderEmbedding R L M).ltEmbedding
instance [IsArtinian R M] : IsAtomic (LieSubmodule R L M) :=
isAtomic_of_orderBot_wellFounded_lt <| (wellFoundedLT_of_isArtinian R L M).wf
@[simp]
theorem subsingleton_iff : Subsingleton (LieSubmodule R L M) ↔ Subsingleton M :=
have h : Subsingleton (LieSubmodule R L M) ↔ Subsingleton (Submodule R M) := by
rw [← subsingleton_iff_bot_eq_top, ← subsingleton_iff_bot_eq_top, ← toSubmodule_inj,
top_toSubmodule, bot_toSubmodule]
h.trans <| Submodule.subsingleton_iff R
@[simp]
theorem nontrivial_iff : Nontrivial (LieSubmodule R L M) ↔ Nontrivial M :=
not_iff_not.mp
((not_nontrivial_iff_subsingleton.trans <| subsingleton_iff R L M).trans
not_nontrivial_iff_subsingleton.symm)
instance [Nontrivial M] : Nontrivial (LieSubmodule R L M) :=
(nontrivial_iff R L M).mpr ‹_›
theorem nontrivial_iff_ne_bot {N : LieSubmodule R L M} : Nontrivial N ↔ N ≠ ⊥ := by
constructor <;> contrapose!
· rintro rfl
⟨⟨m₁, h₁ : m₁ ∈ (⊥ : LieSubmodule R L M)⟩, ⟨m₂, h₂ : m₂ ∈ (⊥ : LieSubmodule R L M)⟩, h₁₂⟩
simp [(LieSubmodule.mem_bot _).mp h₁, (LieSubmodule.mem_bot _).mp h₂] at h₁₂
· rw [not_nontrivial_iff_subsingleton, LieSubmodule.eq_bot_iff]
rintro ⟨h⟩ m hm
simpa using h ⟨m, hm⟩ ⟨_, N.zero_mem⟩
variable {R L M}
section InclusionMaps
/-- The inclusion of a Lie submodule into its ambient space is a morphism of Lie modules. -/
def incl : N →ₗ⁅R,L⁆ M :=
{ Submodule.subtype (N : Submodule R M) with map_lie' := fun {_ _} ↦ rfl }
@[simp]
theorem incl_coe : (N.incl : N →ₗ[R] M) = (N : Submodule R M).subtype :=
rfl
@[simp]
theorem incl_apply (m : N) : N.incl m = m :=
rfl
theorem incl_eq_val : (N.incl : N → M) = Subtype.val :=
rfl
theorem injective_incl : Function.Injective N.incl := Subtype.coe_injective
variable {N N'}
variable (h : N ≤ N')
/-- Given two nested Lie submodules `N ⊆ N'`,
the inclusion `N ↪ N'` is a morphism of Lie modules. -/
def inclusion : N →ₗ⁅R,L⁆ N' where
__ := Submodule.inclusion (show N.toSubmodule ≤ N'.toSubmodule from h)
map_lie' := rfl
@[simp]
theorem coe_inclusion (m : N) : (inclusion h m : M) = m :=
rfl
theorem inclusion_apply (m : N) : inclusion h m = ⟨m.1, h m.2⟩ :=
rfl
theorem inclusion_injective : Function.Injective (inclusion h) := fun x y ↦ by
simp only [inclusion_apply, imp_self, Subtype.mk_eq_mk, SetLike.coe_eq_coe]
end InclusionMaps
section LieSpan
variable (R L) (s : Set M)
/-- The `lieSpan` of a set `s ⊆ M` is the smallest Lie submodule of `M` that contains `s`. -/
def lieSpan : LieSubmodule R L M :=
sInf { N | s ⊆ N }
variable {R L s}
theorem mem_lieSpan {x : M} : x ∈ lieSpan R L s ↔ ∀ N : LieSubmodule R L M, s ⊆ N → x ∈ N := by
rw [← SetLike.mem_coe, lieSpan, sInf_coe]
exact mem_iInter₂
theorem subset_lieSpan : s ⊆ lieSpan R L s := by
intro m hm
rw [SetLike.mem_coe, mem_lieSpan]
intro N hN
exact hN hm
theorem submodule_span_le_lieSpan : Submodule.span R s ≤ lieSpan R L s := by
rw [Submodule.span_le]
apply subset_lieSpan
@[simp]
theorem lieSpan_le {N} : lieSpan R L s ≤ N ↔ s ⊆ N := by
constructor
· exact Subset.trans subset_lieSpan
· intro hs m hm; rw [mem_lieSpan] at hm; exact hm _ hs
theorem lieSpan_mono {t : Set M} (h : s ⊆ t) : lieSpan R L s ≤ lieSpan R L t := by
rw [lieSpan_le]
exact Subset.trans h subset_lieSpan
theorem lieSpan_eq (N : LieSubmodule R L M) : lieSpan R L (N : Set M) = N :=
le_antisymm (lieSpan_le.mpr rfl.subset) subset_lieSpan
theorem coe_lieSpan_submodule_eq_iff {p : Submodule R M} :
(lieSpan R L (p : Set M) : Submodule R M) = p ↔ ∃ N : LieSubmodule R L M, ↑N = p := by
rw [p.exists_lieSubmodule_coe_eq_iff L]; constructor <;> intro h
· intro x m hm; rw [← h, mem_toSubmodule]; exact lie_mem _ (subset_lieSpan hm)
· rw [← toSubmodule_mk p @h, coe_toSubmodule, toSubmodule_inj, lieSpan_eq]
variable (R L M)
/-- `lieSpan` forms a Galois insertion with the coercion from `LieSubmodule` to `Set`. -/
protected def gi : GaloisInsertion (lieSpan R L : Set M → LieSubmodule R L M) (↑) where
choice s _ := lieSpan R L s
gc _ _ := lieSpan_le
le_l_u _ := subset_lieSpan
choice_eq _ _ := rfl
@[simp]
theorem span_empty : lieSpan R L (∅ : Set M) = ⊥ :=
(LieSubmodule.gi R L M).gc.l_bot
@[simp]
theorem span_univ : lieSpan R L (Set.univ : Set M) = ⊤ :=
eq_top_iff.2 <| SetLike.le_def.2 <| subset_lieSpan
theorem lieSpan_eq_bot_iff : lieSpan R L s = ⊥ ↔ ∀ m ∈ s, m = (0 : M) := by
rw [_root_.eq_bot_iff, lieSpan_le, bot_coe, subset_singleton_iff]
variable {M}
theorem span_union (s t : Set M) : lieSpan R L (s ∪ t) = lieSpan R L s ⊔ lieSpan R L t :=
(LieSubmodule.gi R L M).gc.l_sup
theorem span_iUnion {ι} (s : ι → Set M) : lieSpan R L (⋃ i, s i) = ⨆ i, lieSpan R L (s i) :=
(LieSubmodule.gi R L M).gc.l_iSup
/-- An induction principle for span membership. If `p` holds for 0 and all elements of `s`, and is
preserved under addition, scalar multiplication and the Lie bracket, then `p` holds for all
elements of the Lie submodule spanned by `s`. -/
@[elab_as_elim]
theorem lieSpan_induction {p : (x : M) → x ∈ lieSpan R L s → Prop}
(mem : ∀ (x) (h : x ∈ s), p x (subset_lieSpan h))
(zero : p 0 (LieSubmodule.zero_mem _))
(add : ∀ x y hx hy, p x hx → p y hy → p (x + y) (add_mem ‹_› ‹_›))
(smul : ∀ (a : R) (x hx), p x hx → p (a • x) (SMulMemClass.smul_mem _ hx)) {x}
(lie : ∀ (x : L) (y hy), p y hy → p (⁅x, y⁆) (LieSubmodule.lie_mem _ ‹_›))
(hx : x ∈ lieSpan R L s) : p x hx := by
let p : LieSubmodule R L M :=
{ carrier := { x | ∃ hx, p x hx }
add_mem' := fun ⟨_, hpx⟩ ⟨_, hpy⟩ ↦ ⟨_, add _ _ _ _ hpx hpy⟩
zero_mem' := ⟨_, zero⟩
smul_mem' := fun r ↦ fun ⟨_, hpx⟩ ↦ ⟨_, smul r _ _ hpx⟩
lie_mem := fun ⟨_, hpy⟩ ↦ ⟨_, lie _ _ _ hpy⟩ }
exact lieSpan_le (N := p) |>.mpr (fun y hy ↦ ⟨subset_lieSpan hy, mem y hy⟩) hx |>.elim fun _ ↦ id
lemma isCompactElement_lieSpan_singleton (m : M) :
CompleteLattice.IsCompactElement (lieSpan R L {m}) := by
rw [CompleteLattice.isCompactElement_iff_le_of_directed_sSup_le]
intro s hne hdir hsup
replace hsup : m ∈ (↑(sSup s) : Set M) := (SetLike.le_def.mp hsup) (subset_lieSpan rfl)
suffices (↑(sSup s) : Set M) = ⋃ N ∈ s, ↑N by
obtain ⟨N : LieSubmodule R L M, hN : N ∈ s, hN' : m ∈ N⟩ := by
simp_rw [this, Set.mem_iUnion, SetLike.mem_coe, exists_prop] at hsup; assumption
exact ⟨N, hN, by simpa⟩
replace hne : Nonempty s := Set.nonempty_coe_sort.mpr hne
have := Submodule.coe_iSup_of_directed _ hdir.directed_val
simp_rw [← iSup_toSubmodule, Set.iUnion_coe_set, coe_toSubmodule] at this
rw [← this, SetLike.coe_set_eq, sSup_eq_iSup, iSup_subtype]
@[simp]
lemma sSup_image_lieSpan_singleton : sSup ((fun x ↦ lieSpan R L {x}) '' N) = N := by
refine le_antisymm (sSup_le <| by simp) ?_
simp_rw [← toSubmodule_le_toSubmodule, sSup_toSubmodule, Set.mem_image, SetLike.mem_coe]
refine fun m hm ↦ Submodule.mem_sSup.mpr fun N' hN' ↦ ?_
replace hN' : ∀ m ∈ N, lieSpan R L {m} ≤ N' := by simpa using hN'
exact hN' _ hm (subset_lieSpan rfl)
instance instIsCompactlyGenerated : IsCompactlyGenerated (LieSubmodule R L M) :=
⟨fun N ↦ ⟨(fun x ↦ lieSpan R L {x}) '' N, fun _ ⟨m, _, hm⟩ ↦
hm ▸ isCompactElement_lieSpan_singleton R L m, N.sSup_image_lieSpan_singleton⟩⟩
end LieSpan
end LatticeStructure
end LieSubmodule
section LieSubmoduleMapAndComap
variable {R : Type u} {L : Type v} {L' : Type w₂} {M : Type w} {M' : Type w₁}
variable [CommRing R] [LieRing L] [LieRing L'] [LieAlgebra R L']
variable [AddCommGroup M] [Module R M] [LieRingModule L M]
variable [AddCommGroup M'] [Module R M'] [LieRingModule L M']
namespace LieSubmodule
variable (f : M →ₗ⁅R,L⁆ M') (N N₂ : LieSubmodule R L M) (N' : LieSubmodule R L M')
/-- A morphism of Lie modules `f : M → M'` pushes forward Lie submodules of `M` to Lie submodules
of `M'`. -/
def map : LieSubmodule R L M' :=
{ (N : Submodule R M).map (f : M →ₗ[R] M') with
lie_mem := fun {x m'} h ↦ by
rcases h with ⟨m, hm, hfm⟩; use ⁅x, m⁆; constructor
· apply N.lie_mem hm
· norm_cast at hfm; simp [hfm] }
@[simp] theorem coe_map : (N.map f : Set M') = f '' N := rfl
@[simp]
theorem toSubmodule_map : (N.map f : Submodule R M') = (N : Submodule R M).map (f : M →ₗ[R] M') :=
rfl
@[deprecated (since := "2024-12-30")] alias coeSubmodule_map := toSubmodule_map
/-- A morphism of Lie modules `f : M → M'` pulls back Lie submodules of `M'` to Lie submodules of
`M`. -/
def comap : LieSubmodule R L M :=
{ (N' : Submodule R M').comap (f : M →ₗ[R] M') with
lie_mem := fun {x m} h ↦ by
suffices ⁅x, f m⁆ ∈ N' by simp [this]
apply N'.lie_mem h }
@[simp]
theorem toSubmodule_comap :
(N'.comap f : Submodule R M) = (N' : Submodule R M').comap (f : M →ₗ[R] M') :=
rfl
@[deprecated (since := "2024-12-30")] alias coeSubmodule_comap := toSubmodule_comap
variable {f N N₂ N'}
theorem map_le_iff_le_comap : map f N ≤ N' ↔ N ≤ comap f N' :=
Set.image_subset_iff
variable (f) in
theorem gc_map_comap : GaloisConnection (map f) (comap f) := fun _ _ ↦ map_le_iff_le_comap
theorem map_inf_le : (N ⊓ N₂).map f ≤ N.map f ⊓ N₂.map f :=
Set.image_inter_subset f N N₂
theorem map_inf (hf : Function.Injective f) :
(N ⊓ N₂).map f = N.map f ⊓ N₂.map f :=
SetLike.coe_injective <| Set.image_inter hf
@[simp]
theorem map_sup : (N ⊔ N₂).map f = N.map f ⊔ N₂.map f :=
(gc_map_comap f).l_sup
@[simp]
theorem comap_inf {N₂' : LieSubmodule R L M'} :
(N' ⊓ N₂').comap f = N'.comap f ⊓ N₂'.comap f :=
rfl
@[simp]
theorem map_iSup {ι : Sort*} (N : ι → LieSubmodule R L M) :
(⨆ i, N i).map f = ⨆ i, (N i).map f :=
(gc_map_comap f : GaloisConnection (map f) (comap f)).l_iSup
@[simp]
theorem mem_map (m' : M') : m' ∈ N.map f ↔ ∃ m, m ∈ N ∧ f m = m' :=
Submodule.mem_map
theorem mem_map_of_mem {m : M} (h : m ∈ N) : f m ∈ N.map f :=
Set.mem_image_of_mem _ h
@[simp]
theorem mem_comap {m : M} : m ∈ comap f N' ↔ f m ∈ N' :=
Iff.rfl
theorem comap_incl_eq_top : N₂.comap N.incl = ⊤ ↔ N ≤ N₂ := by
rw [← LieSubmodule.toSubmodule_inj, LieSubmodule.toSubmodule_comap, LieSubmodule.incl_coe,
LieSubmodule.top_toSubmodule, Submodule.comap_subtype_eq_top, toSubmodule_le_toSubmodule]
theorem comap_incl_eq_bot : N₂.comap N.incl = ⊥ ↔ N ⊓ N₂ = ⊥ := by
simp only [← toSubmodule_inj, toSubmodule_comap, incl_coe, bot_toSubmodule,
inf_toSubmodule]
rw [← Submodule.disjoint_iff_comap_eq_bot, disjoint_iff]
@[gcongr, mono]
theorem map_mono (h : N ≤ N₂) : N.map f ≤ N₂.map f :=
Set.image_subset _ h
theorem map_comp
{M'' : Type*} [AddCommGroup M''] [Module R M''] [LieRingModule L M''] {g : M' →ₗ⁅R,L⁆ M''} :
N.map (g.comp f) = (N.map f).map g :=
SetLike.coe_injective <| by
simp only [← Set.image_comp, coe_map, LinearMap.coe_comp, LieModuleHom.coe_comp]
@[simp]
theorem map_id : N.map LieModuleHom.id = N := by ext; simp
@[simp] theorem map_bot :
(⊥ : LieSubmodule R L M).map f = ⊥ := by
ext m; simp [eq_comm]
lemma map_le_map_iff (hf : Function.Injective f) :
N.map f ≤ N₂.map f ↔ N ≤ N₂ :=
Set.image_subset_image_iff hf
lemma map_injective_of_injective (hf : Function.Injective f) :
Function.Injective (map f) := fun {N N'} h ↦
SetLike.coe_injective <| hf.image_injective <| by simp only [← coe_map, h]
/-- An injective morphism of Lie modules embeds the lattice of submodules of the domain into that
of the target. -/
@[simps] def mapOrderEmbedding {f : M →ₗ⁅R,L⁆ M'} (hf : Function.Injective f) :
LieSubmodule R L M ↪o LieSubmodule R L M' where
toFun := LieSubmodule.map f
inj' := map_injective_of_injective hf
map_rel_iff' := Set.image_subset_image_iff hf
variable (N) in
/-- For an injective morphism of Lie modules, any Lie submodule is equivalent to its image. -/
noncomputable def equivMapOfInjective (hf : Function.Injective f) :
N ≃ₗ⁅R,L⁆ N.map f :=
{ Submodule.equivMapOfInjective (f : M →ₗ[R] M') hf N with
-- Note: https://github.com/leanprover-community/mathlib4/pull/8386 had to specify `invFun` explicitly this way, otherwise we'd get a type mismatch
invFun := by exact DFunLike.coe (Submodule.equivMapOfInjective (f : M →ₗ[R] M') hf N).symm
map_lie' := by rintro x ⟨m, hm : m ∈ N⟩; ext; exact f.map_lie x m }
/-- An equivalence of Lie modules yields an order-preserving equivalence of their lattices of Lie
Submodules. -/
@[simps] def orderIsoMapComap (e : M ≃ₗ⁅R,L⁆ M') :
LieSubmodule R L M ≃o LieSubmodule R L M' where
toFun := map e
invFun := comap e
left_inv := fun N ↦ by ext; simp
right_inv := fun N ↦ by ext; simp [e.apply_eq_iff_eq_symm_apply]
map_rel_iff' := fun {_ _} ↦ Set.image_subset_image_iff e.injective
end LieSubmodule
end LieSubmoduleMapAndComap
namespace LieModuleHom
variable {R : Type u} {L : Type v} {M : Type w} {N : Type w₁}
variable [CommRing R] [LieRing L]
variable [AddCommGroup M] [Module R M] [LieRingModule L M]
variable [AddCommGroup N] [Module R N] [LieRingModule L N]
variable (f : M →ₗ⁅R,L⁆ N)
/-- The kernel of a morphism of Lie algebras, as an ideal in the domain. -/
def ker : LieSubmodule R L M :=
LieSubmodule.comap f ⊥
@[simp]
theorem ker_toSubmodule : (f.ker : Submodule R M) = LinearMap.ker (f : M →ₗ[R] N) :=
rfl
@[deprecated (since := "2024-12-30")] alias ker_coeSubmodule := ker_toSubmodule
theorem ker_eq_bot : f.ker = ⊥ ↔ Function.Injective f := by
rw [← LieSubmodule.toSubmodule_inj, ker_toSubmodule, LieSubmodule.bot_toSubmodule,
LinearMap.ker_eq_bot, coe_toLinearMap]
variable {f}
@[simp]
theorem mem_ker {m : M} : m ∈ f.ker ↔ f m = 0 :=
Iff.rfl
@[simp]
theorem ker_id : (LieModuleHom.id : M →ₗ⁅R,L⁆ M).ker = ⊥ :=
rfl
@[simp]
theorem comp_ker_incl : f.comp f.ker.incl = 0 := by ext ⟨m, hm⟩; exact mem_ker.mp hm
theorem le_ker_iff_map (M' : LieSubmodule R L M) : M' ≤ f.ker ↔ LieSubmodule.map f M' = ⊥ := by
rw [ker, eq_bot_iff, LieSubmodule.map_le_iff_le_comap]
variable (f)
/-- The range of a morphism of Lie modules `f : M → N` is a Lie submodule of `N`.
See Note [range copy pattern]. -/
def range : LieSubmodule R L N :=
(LieSubmodule.map f ⊤).copy (Set.range f) Set.image_univ.symm
@[simp]
theorem coe_range : f.range = Set.range f :=
rfl
@[simp]
theorem toSubmodule_range : f.range = LinearMap.range (f : M →ₗ[R] N) :=
rfl
@[deprecated (since := "2024-12-30")] alias coeSubmodule_range := toSubmodule_range
@[simp]
theorem mem_range (n : N) : n ∈ f.range ↔ ∃ m, f m = n :=
Iff.rfl
@[simp]
theorem map_top : LieSubmodule.map f ⊤ = f.range := by ext; simp [LieSubmodule.mem_map]
theorem range_eq_top : f.range = ⊤ ↔ Function.Surjective f := by
rw [SetLike.ext'_iff, coe_range, LieSubmodule.top_coe, Set.range_eq_univ]
/-- A morphism of Lie modules `f : M → N` whose values lie in a Lie submodule `P ⊆ N` can be
restricted to a morphism of Lie modules `M → P`. -/
def codRestrict (P : LieSubmodule R L N) (f : M →ₗ⁅R,L⁆ N) (h : ∀ m, f m ∈ P) :
M →ₗ⁅R,L⁆ P where
toFun := f.toLinearMap.codRestrict P h
__ := f.toLinearMap.codRestrict P h
map_lie' {x m} := by ext; simp
@[simp]
lemma codRestrict_apply (P : LieSubmodule R L N) (f : M →ₗ⁅R,L⁆ N) (h : ∀ m, f m ∈ P) (m : M) :
(f.codRestrict P h m : N) = f m :=
rfl
end LieModuleHom
namespace LieSubmodule
variable {R : Type u} {L : Type v} {M : Type w}
variable [CommRing R] [LieRing L]
variable [AddCommGroup M] [Module R M] [LieRingModule L M]
variable (N : LieSubmodule R L M)
@[simp]
theorem ker_incl : N.incl.ker = ⊥ := (LieModuleHom.ker_eq_bot N.incl).mpr <| injective_incl N
@[simp]
theorem range_incl : N.incl.range = N := by
simp only [← toSubmodule_inj, LieModuleHom.toSubmodule_range, incl_coe]
rw [Submodule.range_subtype]
@[simp]
theorem comap_incl_self : comap N.incl N = ⊤ := by
simp only [← toSubmodule_inj, toSubmodule_comap, incl_coe, top_toSubmodule]
rw [Submodule.comap_subtype_self]
theorem map_incl_top : (⊤ : LieSubmodule R L N).map N.incl = N := by simp
variable {N}
@[simp]
lemma map_le_range {M' : Type*}
[AddCommGroup M'] [Module R M'] [LieRingModule L M'] (f : M →ₗ⁅R,L⁆ M') :
N.map f ≤ f.range := by
rw [← LieModuleHom.map_top]
exact LieSubmodule.map_mono le_top
@[simp]
lemma map_incl_lt_iff_lt_top {N' : LieSubmodule R L N} :
N'.map (LieSubmodule.incl N) < N ↔ N' < ⊤ := by
convert (LieSubmodule.mapOrderEmbedding (f := N.incl) Subtype.coe_injective).lt_iff_lt
simp
@[simp]
lemma map_incl_le {N' : LieSubmodule R L N} :
N'.map N.incl ≤ N := by
conv_rhs => rw [← N.map_incl_top]
exact LieSubmodule.map_mono le_top
end LieSubmodule
section TopEquiv
variable (R : Type u) (L : Type v)
variable [CommRing R] [LieRing L]
variable (M : Type*) [AddCommGroup M] [Module R M] [LieRingModule L M]
/-- The natural equivalence between the 'top' Lie submodule and the enclosing Lie module. -/
def LieModuleEquiv.ofTop : (⊤ : LieSubmodule R L M) ≃ₗ⁅R,L⁆ M :=
{ LinearEquiv.ofTop ⊤ rfl with
map_lie' := rfl }
variable {R L}
lemma LieModuleEquiv.ofTop_apply (x : (⊤ : LieSubmodule R L M)) :
LieModuleEquiv.ofTop R L M x = x :=
rfl
@[simp] lemma LieModuleEquiv.range_coe {M' : Type*}
[AddCommGroup M'] [Module R M'] [LieRingModule L M'] (e : M ≃ₗ⁅R,L⁆ M') :
LieModuleHom.range (e : M →ₗ⁅R,L⁆ M') = ⊤ := by
rw [LieModuleHom.range_eq_top]
exact e.surjective
variable [LieAlgebra R L] [LieModule R L M]
/-- The natural equivalence between the 'top' Lie subalgebra and the enclosing Lie algebra.
This is the Lie subalgebra version of `Submodule.topEquiv`. -/
def LieSubalgebra.topEquiv : (⊤ : LieSubalgebra R L) ≃ₗ⁅R⁆ L :=
{ (⊤ : LieSubalgebra R L).incl with
invFun := fun x ↦ ⟨x, Set.mem_univ x⟩
left_inv := fun x ↦ by ext; rfl
right_inv := fun _ ↦ rfl }
@[simp]
theorem LieSubalgebra.topEquiv_apply (x : (⊤ : LieSubalgebra R L)) : LieSubalgebra.topEquiv x = x :=
rfl
end TopEquiv
| Mathlib/Algebra/Lie/Submodule.lean | 1,489 | 1,493 | |
/-
Copyright (c) 2018 Ellen Arlt. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Ellen Arlt, Blair Shi, Sean Leather, Mario Carneiro, Johan Commelin
-/
import Mathlib.Data.Matrix.Basic
import Mathlib.Data.Matrix.Composition
import Mathlib.Data.Matrix.ConjTranspose
/-!
# Block Matrices
## Main definitions
* `Matrix.fromBlocks`: build a block matrix out of 4 blocks
* `Matrix.toBlocks₁₁`, `Matrix.toBlocks₁₂`, `Matrix.toBlocks₂₁`, `Matrix.toBlocks₂₂`:
extract each of the four blocks from `Matrix.fromBlocks`.
* `Matrix.blockDiagonal`: block diagonal of equally sized blocks. On square blocks, this is a
ring homomorphisms, `Matrix.blockDiagonalRingHom`.
* `Matrix.blockDiag`: extract the blocks from the diagonal of a block diagonal matrix.
* `Matrix.blockDiagonal'`: block diagonal of unequally sized blocks. On square blocks, this is a
ring homomorphisms, `Matrix.blockDiagonal'RingHom`.
* `Matrix.blockDiag'`: extract the blocks from the diagonal of a block diagonal matrix.
-/
variable {l m n o p q : Type*} {m' n' p' : o → Type*}
variable {R : Type*} {S : Type*} {α : Type*} {β : Type*}
open Matrix
namespace Matrix
theorem dotProduct_block [Fintype m] [Fintype n] [Mul α] [AddCommMonoid α] (v w : m ⊕ n → α) :
v ⬝ᵥ w = v ∘ Sum.inl ⬝ᵥ w ∘ Sum.inl + v ∘ Sum.inr ⬝ᵥ w ∘ Sum.inr :=
Fintype.sum_sum_type _
section BlockMatrices
/-- We can form a single large matrix by flattening smaller 'block' matrices of compatible
dimensions. -/
@[pp_nodot]
def fromBlocks (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) :
Matrix (n ⊕ o) (l ⊕ m) α :=
of <| Sum.elim (fun i => Sum.elim (A i) (B i)) (fun j => Sum.elim (C j) (D j))
@[simp]
theorem fromBlocks_apply₁₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α)
(D : Matrix o m α) (i : n) (j : l) : fromBlocks A B C D (Sum.inl i) (Sum.inl j) = A i j :=
rfl
@[simp]
theorem fromBlocks_apply₁₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α)
(D : Matrix o m α) (i : n) (j : m) : fromBlocks A B C D (Sum.inl i) (Sum.inr j) = B i j :=
rfl
@[simp]
theorem fromBlocks_apply₂₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α)
(D : Matrix o m α) (i : o) (j : l) : fromBlocks A B C D (Sum.inr i) (Sum.inl j) = C i j :=
rfl
@[simp]
theorem fromBlocks_apply₂₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α)
(D : Matrix o m α) (i : o) (j : m) : fromBlocks A B C D (Sum.inr i) (Sum.inr j) = D i j :=
rfl
/-- Given a matrix whose row and column indexes are sum types, we can extract the corresponding
"top left" submatrix. -/
def toBlocks₁₁ (M : Matrix (n ⊕ o) (l ⊕ m) α) : Matrix n l α :=
of fun i j => M (Sum.inl i) (Sum.inl j)
/-- Given a matrix whose row and column indexes are sum types, we can extract the corresponding
"top right" submatrix. -/
def toBlocks₁₂ (M : Matrix (n ⊕ o) (l ⊕ m) α) : Matrix n m α :=
of fun i j => M (Sum.inl i) (Sum.inr j)
/-- Given a matrix whose row and column indexes are sum types, we can extract the corresponding
"bottom left" submatrix. -/
def toBlocks₂₁ (M : Matrix (n ⊕ o) (l ⊕ m) α) : Matrix o l α :=
of fun i j => M (Sum.inr i) (Sum.inl j)
/-- Given a matrix whose row and column indexes are sum types, we can extract the corresponding
"bottom right" submatrix. -/
def toBlocks₂₂ (M : Matrix (n ⊕ o) (l ⊕ m) α) : Matrix o m α :=
of fun i j => M (Sum.inr i) (Sum.inr j)
theorem fromBlocks_toBlocks (M : Matrix (n ⊕ o) (l ⊕ m) α) :
fromBlocks M.toBlocks₁₁ M.toBlocks₁₂ M.toBlocks₂₁ M.toBlocks₂₂ = M := by
ext i j
rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> rfl
@[simp]
theorem toBlocks_fromBlocks₁₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α)
(D : Matrix o m α) : (fromBlocks A B C D).toBlocks₁₁ = A :=
rfl
@[simp]
theorem toBlocks_fromBlocks₁₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α)
(D : Matrix o m α) : (fromBlocks A B C D).toBlocks₁₂ = B :=
rfl
@[simp]
theorem toBlocks_fromBlocks₂₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α)
(D : Matrix o m α) : (fromBlocks A B C D).toBlocks₂₁ = C :=
rfl
@[simp]
theorem toBlocks_fromBlocks₂₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α)
(D : Matrix o m α) : (fromBlocks A B C D).toBlocks₂₂ = D :=
rfl
/-- Two block matrices are equal if their blocks are equal. -/
theorem ext_iff_blocks {A B : Matrix (n ⊕ o) (l ⊕ m) α} :
A = B ↔
A.toBlocks₁₁ = B.toBlocks₁₁ ∧
A.toBlocks₁₂ = B.toBlocks₁₂ ∧ A.toBlocks₂₁ = B.toBlocks₂₁ ∧ A.toBlocks₂₂ = B.toBlocks₂₂ :=
⟨fun h => h ▸ ⟨rfl, rfl, rfl, rfl⟩, fun ⟨h₁₁, h₁₂, h₂₁, h₂₂⟩ => by
rw [← fromBlocks_toBlocks A, ← fromBlocks_toBlocks B, h₁₁, h₁₂, h₂₁, h₂₂]⟩
@[simp]
theorem fromBlocks_inj {A : Matrix n l α} {B : Matrix n m α} {C : Matrix o l α} {D : Matrix o m α}
{A' : Matrix n l α} {B' : Matrix n m α} {C' : Matrix o l α} {D' : Matrix o m α} :
fromBlocks A B C D = fromBlocks A' B' C' D' ↔ A = A' ∧ B = B' ∧ C = C' ∧ D = D' :=
ext_iff_blocks
theorem fromBlocks_map (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α)
(f : α → β) : (fromBlocks A B C D).map f =
fromBlocks (A.map f) (B.map f) (C.map f) (D.map f) := by
ext i j; rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [fromBlocks]
theorem fromBlocks_transpose (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α)
(D : Matrix o m α) : (fromBlocks A B C D)ᵀ = fromBlocks Aᵀ Cᵀ Bᵀ Dᵀ := by
ext i j
rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [fromBlocks]
theorem fromBlocks_conjTranspose [Star α] (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α)
(D : Matrix o m α) : (fromBlocks A B C D)ᴴ = fromBlocks Aᴴ Cᴴ Bᴴ Dᴴ := by
simp only [conjTranspose, fromBlocks_transpose, fromBlocks_map]
@[simp]
theorem fromBlocks_submatrix_sum_swap_left (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α)
(D : Matrix o m α) (f : p → l ⊕ m) :
(fromBlocks A B C D).submatrix Sum.swap f = (fromBlocks C D A B).submatrix id f := by
ext i j
cases i <;> dsimp <;> cases f j <;> rfl
@[simp]
theorem fromBlocks_submatrix_sum_swap_right (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α)
(D : Matrix o m α) (f : p → n ⊕ o) :
(fromBlocks A B C D).submatrix f Sum.swap = (fromBlocks B A D C).submatrix f id := by
ext i j
cases j <;> dsimp <;> cases f i <;> rfl
theorem fromBlocks_submatrix_sum_swap_sum_swap {l m n o α : Type*} (A : Matrix n l α)
(B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) :
(fromBlocks A B C D).submatrix Sum.swap Sum.swap = fromBlocks D C B A := by simp
/-- A 2x2 block matrix is block diagonal if the blocks outside of the diagonal vanish -/
def IsTwoBlockDiagonal [Zero α] (A : Matrix (n ⊕ o) (l ⊕ m) α) : Prop :=
toBlocks₁₂ A = 0 ∧ toBlocks₂₁ A = 0
/-- Let `p` pick out certain rows and `q` pick out certain columns of a matrix `M`. Then
`toBlock M p q` is the corresponding block matrix. -/
def toBlock (M : Matrix m n α) (p : m → Prop) (q : n → Prop) : Matrix { a // p a } { a // q a } α :=
M.submatrix (↑) (↑)
@[simp]
theorem toBlock_apply (M : Matrix m n α) (p : m → Prop) (q : n → Prop) (i : { a // p a })
(j : { a // q a }) : toBlock M p q i j = M ↑i ↑j :=
rfl
/-- Let `p` pick out certain rows and columns of a square matrix `M`. Then
`toSquareBlockProp M p` is the corresponding block matrix. -/
def toSquareBlockProp (M : Matrix m m α) (p : m → Prop) : Matrix { a // p a } { a // p a } α :=
toBlock M _ _
theorem toSquareBlockProp_def (M : Matrix m m α) (p : m → Prop) :
toSquareBlockProp M p = of (fun i j : { a // p a } => M ↑i ↑j) :=
rfl
/-- Let `b` map rows and columns of a square matrix `M` to blocks. Then
`toSquareBlock M b k` is the block `k` matrix. -/
def toSquareBlock (M : Matrix m m α) (b : m → β) (k : β) :
Matrix { a // b a = k } { a // b a = k } α :=
toSquareBlockProp M _
theorem toSquareBlock_def (M : Matrix m m α) (b : m → β) (k : β) :
toSquareBlock M b k = of (fun i j : { a // b a = k } => M ↑i ↑j) :=
rfl
theorem fromBlocks_smul [SMul R α] (x : R) (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α)
(D : Matrix o m α) : x • fromBlocks A B C D = fromBlocks (x • A) (x • B) (x • C) (x • D) := by
ext i j; rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [fromBlocks]
theorem fromBlocks_neg [Neg R] (A : Matrix n l R) (B : Matrix n m R) (C : Matrix o l R)
(D : Matrix o m R) : -fromBlocks A B C D = fromBlocks (-A) (-B) (-C) (-D) := by
ext i j
cases i <;> cases j <;> simp [fromBlocks]
@[simp]
theorem fromBlocks_zero [Zero α] : fromBlocks (0 : Matrix n l α) 0 0 (0 : Matrix o m α) = 0 := by
ext i j
rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> rfl
theorem fromBlocks_add [Add α] (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α)
(D : Matrix o m α) (A' : Matrix n l α) (B' : Matrix n m α) (C' : Matrix o l α)
(D' : Matrix o m α) : fromBlocks A B C D + fromBlocks A' B' C' D' =
fromBlocks (A + A') (B + B') (C + C') (D + D') := by
ext i j; rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> rfl
theorem fromBlocks_multiply [Fintype l] [Fintype m] [NonUnitalNonAssocSemiring α] (A : Matrix n l α)
(B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (A' : Matrix l p α) (B' : Matrix l q α)
(C' : Matrix m p α) (D' : Matrix m q α) :
fromBlocks A B C D * fromBlocks A' B' C' D' =
fromBlocks (A * A' + B * C') (A * B' + B * D') (C * A' + D * C') (C * B' + D * D') := by
ext i j
rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp only [fromBlocks, mul_apply, of_apply,
Sum.elim_inr, Fintype.sum_sum_type, Sum.elim_inl, add_apply]
theorem fromBlocks_mulVec [Fintype l] [Fintype m] [NonUnitalNonAssocSemiring α] (A : Matrix n l α)
(B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (x : l ⊕ m → α) :
(fromBlocks A B C D) *ᵥ x =
Sum.elim (A *ᵥ (x ∘ Sum.inl) + B *ᵥ (x ∘ Sum.inr))
(C *ᵥ (x ∘ Sum.inl) + D *ᵥ (x ∘ Sum.inr)) := by
ext i
cases i <;> simp [mulVec, dotProduct]
theorem vecMul_fromBlocks [Fintype n] [Fintype o] [NonUnitalNonAssocSemiring α] (A : Matrix n l α)
| (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (x : n ⊕ o → α) :
x ᵥ* fromBlocks A B C D =
Sum.elim ((x ∘ Sum.inl) ᵥ* A + (x ∘ Sum.inr) ᵥ* C)
((x ∘ Sum.inl) ᵥ* B + (x ∘ Sum.inr) ᵥ* D) := by
| Mathlib/Data/Matrix/Block.lean | 228 | 231 |
/-
Copyright (c) 2022 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes
-/
import Mathlib.Algebra.Algebra.ZMod
import Mathlib.Algebra.Field.ZMod
import Mathlib.Algebra.MvPolynomial.Cardinal
import Mathlib.FieldTheory.IsAlgClosed.Basic
import Mathlib.RingTheory.Algebraic.Cardinality
import Mathlib.RingTheory.AlgebraicIndependent.TranscendenceBasis
/-!
# Classification of Algebraically closed fields
This file contains results related to classifying algebraically closed fields.
## Main statements
* `IsAlgClosed.equivOfTranscendenceBasis` Two algebraically closed fields with the same
characteristic and the same cardinality of transcendence basis are isomorphic.
* `IsAlgClosed.ringEquivOfCardinalEqOfCharEq` Two uncountable algebraically closed fields
are isomorphic if they have the same characteristic and the same cardinality.
-/
universe u v w
open scoped Cardinal Polynomial
open Cardinal
namespace IsAlgClosed
section Classification
noncomputable section
variable {R L K : Type*} [CommRing R]
variable [Field K] [Algebra R K]
| variable [Field L] [Algebra R L]
variable {ι : Type*} (v : ι → K)
variable {κ : Type*} (w : κ → L)
variable (hv : AlgebraicIndependent R v)
theorem isAlgClosure_of_transcendence_basis [IsAlgClosed K] (hv : IsTranscendenceBasis R v) :
IsAlgClosure (Algebra.adjoin R (Set.range v)) K :=
letI := RingHom.domain_nontrivial (algebraMap R K)
{ isAlgClosed := by infer_instance
isAlgebraic := hv.isAlgebraic }
variable (hw : AlgebraicIndependent R w)
/-- setting `R` to be `ZMod (ringChar R)` this result shows that if two algebraically
closed fields have equipotent transcendence bases and the same characteristic then they are
isomorphic. -/
def equivOfTranscendenceBasis [IsAlgClosed K] [IsAlgClosed L] (e : ι ≃ κ)
(hv : IsTranscendenceBasis R v) (hw : IsTranscendenceBasis R w) : K ≃+* L := by
letI := isAlgClosure_of_transcendence_basis v hv
| Mathlib/FieldTheory/IsAlgClosed/Classification.lean | 41 | 59 |
/-
Copyright (c) 2021 Heather Macbeth. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Heather Macbeth, Yury Kudryashov
-/
import Mathlib.Topology.Order.Basic
/-!
# Bounded monotone sequences converge
In this file we prove a few theorems of the form “if the range of a monotone function `f : ι → α`
admits a least upper bound `a`, then `f x` tends to `a` as `x → ∞`”, as well as version of this
statement for (conditionally) complete lattices that use `⨆ x, f x` instead of `IsLUB`.
These theorems work for linear orders with order topologies as well as their products (both in terms
of `Prod` and in terms of function types). In order to reduce code duplication, we introduce two
typeclasses (one for the property formulated above and one for the dual property), prove theorems
assuming one of these typeclasses, and provide instances for linear orders and their products.
We also prove some "inverse" results: if `f n` is a monotone sequence and `a` is its limit,
then `f n ≤ a` for all `n`.
## Tags
monotone convergence
-/
open Filter Set Function
open scoped Topology
variable {α β : Type*}
/-- We say that `α` is a `SupConvergenceClass` if the following holds. Let `f : ι → α` be a
monotone function, let `a : α` be a least upper bound of `Set.range f`. Then `f x` tends to `𝓝 a`
as `x → ∞` (formally, at the filter `Filter.atTop`). We require this for `ι = (s : Set α)`,
`f = (↑)` in the definition, then prove it for any `f` in `tendsto_atTop_isLUB`.
This property holds for linear orders with order topology as well as their products. -/
class SupConvergenceClass (α : Type*) [Preorder α] [TopologicalSpace α] : Prop where
/-- proof that a monotone function tends to `𝓝 a` as `x → ∞` -/
tendsto_coe_atTop_isLUB :
∀ (a : α) (s : Set α), IsLUB s a → Tendsto ((↑) : s → α) atTop (𝓝 a)
/-- We say that `α` is an `InfConvergenceClass` if the following holds. Let `f : ι → α` be a
monotone function, let `a : α` be a greatest lower bound of `Set.range f`. Then `f x` tends to `𝓝 a`
as `x → -∞` (formally, at the filter `Filter.atBot`). We require this for `ι = (s : Set α)`,
`f = (↑)` in the definition, then prove it for any `f` in `tendsto_atBot_isGLB`.
This property holds for linear orders with order topology as well as their products. -/
class InfConvergenceClass (α : Type*) [Preorder α] [TopologicalSpace α] : Prop where
/-- proof that a monotone function tends to `𝓝 a` as `x → -∞` -/
tendsto_coe_atBot_isGLB :
∀ (a : α) (s : Set α), IsGLB s a → Tendsto ((↑) : s → α) atBot (𝓝 a)
instance OrderDual.supConvergenceClass [Preorder α] [TopologicalSpace α] [InfConvergenceClass α] :
SupConvergenceClass αᵒᵈ :=
⟨‹InfConvergenceClass α›.1⟩
instance OrderDual.infConvergenceClass [Preorder α] [TopologicalSpace α] [SupConvergenceClass α] :
InfConvergenceClass αᵒᵈ :=
⟨‹SupConvergenceClass α›.1⟩
-- see Note [lower instance priority]
instance (priority := 100) LinearOrder.supConvergenceClass [TopologicalSpace α] [LinearOrder α]
[OrderTopology α] : SupConvergenceClass α := by
refine ⟨fun a s ha => tendsto_order.2 ⟨fun b hb => ?_, fun b hb => ?_⟩⟩
· rcases ha.exists_between hb with ⟨c, hcs, bc, bca⟩
lift c to s using hcs
exact (eventually_ge_atTop c).mono fun x hx => bc.trans_le hx
· exact Eventually.of_forall fun x => (ha.1 x.2).trans_lt hb
-- see Note [lower instance priority]
instance (priority := 100) LinearOrder.infConvergenceClass [TopologicalSpace α] [LinearOrder α]
[OrderTopology α] : InfConvergenceClass α :=
show InfConvergenceClass αᵒᵈᵒᵈ from OrderDual.infConvergenceClass
section
variable {ι : Type*} [Preorder ι] [TopologicalSpace α]
section IsLUB
variable [Preorder α] [SupConvergenceClass α] {f : ι → α} {a : α}
theorem tendsto_atTop_isLUB (h_mono : Monotone f) (ha : IsLUB (Set.range f) a) :
Tendsto f atTop (𝓝 a) := by
suffices Tendsto (rangeFactorization f) atTop atTop from
(SupConvergenceClass.tendsto_coe_atTop_isLUB _ _ ha).comp this
exact h_mono.rangeFactorization.tendsto_atTop_atTop fun b => b.2.imp fun a ha => ha.ge
theorem tendsto_atBot_isLUB (h_anti : Antitone f) (ha : IsLUB (Set.range f) a) :
Tendsto f atBot (𝓝 a) := by convert tendsto_atTop_isLUB h_anti.dual_left ha using 1
end IsLUB
section IsGLB
variable [Preorder α] [InfConvergenceClass α] {f : ι → α} {a : α}
theorem tendsto_atBot_isGLB (h_mono : Monotone f) (ha : IsGLB (Set.range f) a) :
Tendsto f atBot (𝓝 a) := by convert tendsto_atTop_isLUB h_mono.dual ha.dual using 1
theorem tendsto_atTop_isGLB (h_anti : Antitone f) (ha : IsGLB (Set.range f) a) :
Tendsto f atTop (𝓝 a) := by convert tendsto_atBot_isLUB h_anti.dual ha.dual using 1
end IsGLB
section CiSup
variable [ConditionallyCompleteLattice α] [SupConvergenceClass α] {f : ι → α}
theorem tendsto_atTop_ciSup (h_mono : Monotone f) (hbdd : BddAbove <| range f) :
Tendsto f atTop (𝓝 (⨆ i, f i)) := by
cases isEmpty_or_nonempty ι
exacts [tendsto_of_isEmpty, tendsto_atTop_isLUB h_mono (isLUB_ciSup hbdd)]
| theorem tendsto_atBot_ciSup (h_anti : Antitone f) (hbdd : BddAbove <| range f) :
Tendsto f atBot (𝓝 (⨆ i, f i)) := by convert tendsto_atTop_ciSup h_anti.dual hbdd.dual using 1
| Mathlib/Topology/Order/MonotoneConvergence.lean | 117 | 118 |
/-
Copyright (c) 2020 Joseph Myers. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Joseph Myers
-/
import Mathlib.Geometry.Euclidean.Projection
import Mathlib.Geometry.Euclidean.Sphere.Basic
import Mathlib.LinearAlgebra.AffineSpace.FiniteDimensional
import Mathlib.Tactic.DeriveFintype
/-!
# Circumcenter and circumradius
This file proves some lemmas on points equidistant from a set of
points, and defines the circumradius and circumcenter of a simplex.
There are also some definitions for use in calculations where it is
convenient to work with affine combinations of vertices together with
the circumcenter.
## Main definitions
* `circumcenter` and `circumradius` are the circumcenter and
circumradius of a simplex.
## References
* https://en.wikipedia.org/wiki/Circumscribed_circle
-/
noncomputable section
open RealInnerProductSpace
namespace EuclideanGeometry
variable {V : Type*} {P : Type*} [NormedAddCommGroup V] [InnerProductSpace ℝ V] [MetricSpace P]
[NormedAddTorsor V P]
open AffineSubspace
/-- The induction step for the existence and uniqueness of the
circumcenter. Given a nonempty set of points in a nonempty affine
subspace whose direction is complete, such that there is a unique
(circumcenter, circumradius) pair for those points in that subspace,
and a point `p` not in that subspace, there is a unique (circumcenter,
circumradius) pair for the set with `p` added, in the span of the
subspace with `p` added. -/
theorem existsUnique_dist_eq_of_insert {s : AffineSubspace ℝ P}
[s.direction.HasOrthogonalProjection] {ps : Set P} (hnps : ps.Nonempty) {p : P} (hps : ps ⊆ s)
(hp : p ∉ s) (hu : ∃! cs : Sphere P, cs.center ∈ s ∧ ps ⊆ (cs : Set P)) :
∃! cs₂ : Sphere P,
cs₂.center ∈ affineSpan ℝ (insert p (s : Set P)) ∧ insert p ps ⊆ (cs₂ : Set P) := by
haveI : Nonempty s := Set.Nonempty.to_subtype (hnps.mono hps)
rcases hu with ⟨⟨cc, cr⟩, ⟨hcc, hcr⟩, hcccru⟩
simp only at hcc hcr hcccru
let x := dist cc (orthogonalProjection s p)
let y := dist p (orthogonalProjection s p)
have hy0 : y ≠ 0 := dist_orthogonalProjection_ne_zero_of_not_mem hp
let ycc₂ := (x * x + y * y - cr * cr) / (2 * y)
let cc₂ := (ycc₂ / y) • (p -ᵥ orthogonalProjection s p : V) +ᵥ cc
let cr₂ := √(cr * cr + ycc₂ * ycc₂)
use ⟨cc₂, cr₂⟩
simp -zeta -proj only
have hpo : p = (1 : ℝ) • (p -ᵥ orthogonalProjection s p : V) +ᵥ (orthogonalProjection s p : P) :=
by simp
constructor
· constructor
· refine vadd_mem_of_mem_direction ?_ (mem_affineSpan ℝ (Set.mem_insert_of_mem _ hcc))
rw [direction_affineSpan]
exact
Submodule.smul_mem _ _
(vsub_mem_vectorSpan ℝ (Set.mem_insert _ _)
(Set.mem_insert_of_mem _ (orthogonalProjection_mem _)))
· intro p₁ hp₁
rw [Sphere.mem_coe, mem_sphere, ← mul_self_inj_of_nonneg dist_nonneg (Real.sqrt_nonneg _),
Real.mul_self_sqrt (add_nonneg (mul_self_nonneg _) (mul_self_nonneg _))]
rcases hp₁ with hp₁ | hp₁
· rw [hp₁]
rw [hpo,
dist_sq_smul_orthogonal_vadd_smul_orthogonal_vadd (orthogonalProjection_mem p) hcc _ _
(vsub_orthogonalProjection_mem_direction_orthogonal s p),
← dist_eq_norm_vsub V p, dist_comm _ cc]
-- TODO(https://github.com/leanprover-community/mathlib4/issues/15486): used to be `field_simp`, but was really slow
-- replaced by `simp only ...` to speed up. Reinstate `field_simp` once it is faster.
simp (disch := field_simp_discharge) only [div_div, sub_div', one_mul, mul_div_assoc',
div_mul_eq_mul_div, add_div', eq_div_iff, div_eq_iff, ycc₂]
ring
· rw [dist_sq_eq_dist_orthogonalProjection_sq_add_dist_orthogonalProjection_sq _ (hps hp₁),
orthogonalProjection_vadd_smul_vsub_orthogonalProjection _ _ hcc, Subtype.coe_mk,
dist_of_mem_subset_mk_sphere hp₁ hcr, dist_eq_norm_vsub V cc₂ cc, vadd_vsub, norm_smul, ←
dist_eq_norm_vsub V, Real.norm_eq_abs, abs_div, abs_of_nonneg dist_nonneg,
div_mul_cancel₀ _ hy0, abs_mul_abs_self]
· rintro ⟨cc₃, cr₃⟩ ⟨hcc₃, hcr₃⟩
simp only at hcc₃ hcr₃
obtain ⟨t₃, cc₃', hcc₃', hcc₃''⟩ :
∃ r : ℝ, ∃ p0 ∈ s, cc₃ = r • (p -ᵥ ↑((orthogonalProjection s) p)) +ᵥ p0 := by
rwa [mem_affineSpan_insert_iff (orthogonalProjection_mem p)] at hcc₃
have hcr₃' : ∃ r, ∀ p₁ ∈ ps, dist p₁ cc₃ = r :=
⟨cr₃, fun p₁ hp₁ => dist_of_mem_subset_mk_sphere (Set.mem_insert_of_mem _ hp₁) hcr₃⟩
rw [exists_dist_eq_iff_exists_dist_orthogonalProjection_eq hps cc₃, hcc₃'',
orthogonalProjection_vadd_smul_vsub_orthogonalProjection _ _ hcc₃'] at hcr₃'
obtain ⟨cr₃', hcr₃'⟩ := hcr₃'
have hu := hcccru ⟨cc₃', cr₃'⟩
simp only at hu
replace hu := hu ⟨hcc₃', hcr₃'⟩
-- Porting note: was
-- cases' hu with hucc hucr
-- substs hucc hucr
cases hu
have hcr₃val : cr₃ = √(cr * cr + t₃ * y * (t₃ * y)) := by
obtain ⟨p0, hp0⟩ := hnps
have h' : ↑(⟨cc, hcc₃'⟩ : s) = cc := rfl
rw [← dist_of_mem_subset_mk_sphere (Set.mem_insert_of_mem _ hp0) hcr₃, hcc₃'', ←
mul_self_inj_of_nonneg dist_nonneg (Real.sqrt_nonneg _),
Real.mul_self_sqrt (add_nonneg (mul_self_nonneg _) (mul_self_nonneg _)),
dist_sq_eq_dist_orthogonalProjection_sq_add_dist_orthogonalProjection_sq _ (hps hp0),
orthogonalProjection_vadd_smul_vsub_orthogonalProjection _ _ hcc₃', h',
dist_of_mem_subset_mk_sphere hp0 hcr, dist_eq_norm_vsub V _ cc, vadd_vsub, norm_smul, ←
dist_eq_norm_vsub V p, Real.norm_eq_abs, ← mul_assoc, mul_comm _ |t₃|, ← mul_assoc,
abs_mul_abs_self]
ring
replace hcr₃ := dist_of_mem_subset_mk_sphere (Set.mem_insert _ _) hcr₃
rw [hpo, hcc₃'', hcr₃val, ← mul_self_inj_of_nonneg dist_nonneg (Real.sqrt_nonneg _),
dist_sq_smul_orthogonal_vadd_smul_orthogonal_vadd (orthogonalProjection_mem p) hcc₃' _ _
(vsub_orthogonalProjection_mem_direction_orthogonal s p),
dist_comm, ← dist_eq_norm_vsub V p,
Real.mul_self_sqrt (add_nonneg (mul_self_nonneg _) (mul_self_nonneg _))] at hcr₃
change x * x + _ * (y * y) = _ at hcr₃
rw [show
x * x + (1 - t₃) * (1 - t₃) * (y * y) = x * x + y * y - 2 * y * (t₃ * y) + t₃ * y * (t₃ * y)
by ring,
add_left_inj] at hcr₃
have ht₃ : t₃ = ycc₂ / y := by field_simp [ycc₂, ← hcr₃, hy0]
subst ht₃
change cc₃ = cc₂ at hcc₃''
congr
rw [hcr₃val]
congr 2
field_simp [hy0]
/-- Given a finite nonempty affinely independent family of points,
there is a unique (circumcenter, circumradius) pair for those points
in the affine subspace they span. -/
theorem _root_.AffineIndependent.existsUnique_dist_eq {ι : Type*} [hne : Nonempty ι] [Finite ι]
{p : ι → P} (ha : AffineIndependent ℝ p) :
∃! cs : Sphere P, cs.center ∈ affineSpan ℝ (Set.range p) ∧ Set.range p ⊆ (cs : Set P) := by
cases nonempty_fintype ι
induction' hn : Fintype.card ι with m hm generalizing ι
· exfalso
have h := Fintype.card_pos_iff.2 hne
rw [hn] at h
exact lt_irrefl 0 h
· rcases m with - | m
· rw [Fintype.card_eq_one_iff] at hn
obtain ⟨i, hi⟩ := hn
haveI : Unique ι := ⟨⟨i⟩, hi⟩
use ⟨p i, 0⟩
simp only [Set.range_unique, AffineSubspace.mem_affineSpan_singleton]
constructor
· simp_rw [hi default, Set.singleton_subset_iff]
exact ⟨⟨⟩, by simp only [Metric.sphere_zero, Set.mem_singleton_iff]⟩
· rintro ⟨cc, cr⟩
simp only
rintro ⟨rfl, hdist⟩
simp? [Set.singleton_subset_iff] at hdist says
simp only [Set.singleton_subset_iff, Metric.mem_sphere, dist_self] at hdist
rw [hi default, hdist]
· have i := hne.some
let ι2 := { x // x ≠ i }
classical
have hc : Fintype.card ι2 = m + 1 := by
rw [Fintype.card_of_subtype {x | x ≠ i}]
· rw [Finset.filter_not]
-- Porting note: removed `simp_rw [eq_comm]` and used `filter_eq'` instead of `filter_eq`
rw [Finset.filter_eq' _ i, if_pos (Finset.mem_univ _),
Finset.card_sdiff (Finset.subset_univ _), Finset.card_singleton, Finset.card_univ, hn]
simp
· simp
haveI : Nonempty ι2 := Fintype.card_pos_iff.1 (hc.symm ▸ Nat.zero_lt_succ _)
have ha2 : AffineIndependent ℝ fun i2 : ι2 => p i2 := ha.subtype _
replace hm := hm ha2 _ hc
have hr : Set.range p = insert (p i) (Set.range fun i2 : ι2 => p i2) := by
change _ = insert _ (Set.range fun i2 : { x | x ≠ i } => p i2)
rw [← Set.image_eq_range, ← Set.image_univ, ← Set.image_insert_eq]
congr with j
simp [Classical.em]
rw [hr, ← affineSpan_insert_affineSpan]
refine existsUnique_dist_eq_of_insert (Set.range_nonempty _) (subset_affineSpan ℝ _) ?_ hm
convert ha.not_mem_affineSpan_diff i Set.univ
change (Set.range fun i2 : { x | x ≠ i } => p i2) = _
rw [← Set.image_eq_range]
congr with j
simp
end EuclideanGeometry
namespace Affine
namespace Simplex
open Finset AffineSubspace EuclideanGeometry
variable {V : Type*} {P : Type*} [NormedAddCommGroup V] [InnerProductSpace ℝ V] [MetricSpace P]
[NormedAddTorsor V P]
/-- The circumsphere of a simplex. -/
def circumsphere {n : ℕ} (s : Simplex ℝ P n) : Sphere P :=
s.independent.existsUnique_dist_eq.choose
/-- The property satisfied by the circumsphere. -/
theorem circumsphere_unique_dist_eq {n : ℕ} (s : Simplex ℝ P n) :
(s.circumsphere.center ∈ affineSpan ℝ (Set.range s.points) ∧
Set.range s.points ⊆ s.circumsphere) ∧
∀ cs : Sphere P,
cs.center ∈ affineSpan ℝ (Set.range s.points) ∧ Set.range s.points ⊆ cs →
cs = s.circumsphere :=
s.independent.existsUnique_dist_eq.choose_spec
/-- The circumcenter of a simplex. -/
def circumcenter {n : ℕ} (s : Simplex ℝ P n) : P :=
s.circumsphere.center
/-- The circumradius of a simplex. -/
def circumradius {n : ℕ} (s : Simplex ℝ P n) : ℝ :=
s.circumsphere.radius
/-- The center of the circumsphere is the circumcenter. -/
@[simp]
theorem circumsphere_center {n : ℕ} (s : Simplex ℝ P n) : s.circumsphere.center = s.circumcenter :=
rfl
/-- The radius of the circumsphere is the circumradius. -/
@[simp]
theorem circumsphere_radius {n : ℕ} (s : Simplex ℝ P n) : s.circumsphere.radius = s.circumradius :=
rfl
/-- The circumcenter lies in the affine span. -/
theorem circumcenter_mem_affineSpan {n : ℕ} (s : Simplex ℝ P n) :
s.circumcenter ∈ affineSpan ℝ (Set.range s.points) :=
s.circumsphere_unique_dist_eq.1.1
/-- All points have distance from the circumcenter equal to the
circumradius. -/
@[simp]
theorem dist_circumcenter_eq_circumradius {n : ℕ} (s : Simplex ℝ P n) (i : Fin (n + 1)) :
dist (s.points i) s.circumcenter = s.circumradius :=
dist_of_mem_subset_sphere (Set.mem_range_self _) s.circumsphere_unique_dist_eq.1.2
/-- All points lie in the circumsphere. -/
theorem mem_circumsphere {n : ℕ} (s : Simplex ℝ P n) (i : Fin (n + 1)) :
s.points i ∈ s.circumsphere :=
s.dist_circumcenter_eq_circumradius i
/-- All points have distance to the circumcenter equal to the
circumradius. -/
@[simp]
theorem dist_circumcenter_eq_circumradius' {n : ℕ} (s : Simplex ℝ P n) :
∀ i, dist s.circumcenter (s.points i) = s.circumradius := by
intro i
rw [dist_comm]
exact dist_circumcenter_eq_circumradius _ _
/-- Given a point in the affine span from which all the points are
equidistant, that point is the circumcenter. -/
theorem eq_circumcenter_of_dist_eq {n : ℕ} (s : Simplex ℝ P n) {p : P}
(hp : p ∈ affineSpan ℝ (Set.range s.points)) {r : ℝ} (hr : ∀ i, dist (s.points i) p = r) :
p = s.circumcenter := by
have h := s.circumsphere_unique_dist_eq.2 ⟨p, r⟩
simp only [hp, hr, forall_const, eq_self_iff_true, subset_sphere, Sphere.ext_iff,
Set.forall_mem_range, mem_sphere, true_and] at h
-- Porting note: added the next three lines (`simp` less powerful)
rw [subset_sphere (s := ⟨p, r⟩)] at h
simp only [hp, hr, forall_const, eq_self_iff_true, subset_sphere, Sphere.ext_iff,
Set.forall_mem_range, mem_sphere, true_and] at h
exact h.1
/-- Given a point in the affine span from which all the points are
equidistant, that distance is the circumradius. -/
theorem eq_circumradius_of_dist_eq {n : ℕ} (s : Simplex ℝ P n) {p : P}
(hp : p ∈ affineSpan ℝ (Set.range s.points)) {r : ℝ} (hr : ∀ i, dist (s.points i) p = r) :
r = s.circumradius := by
have h := s.circumsphere_unique_dist_eq.2 ⟨p, r⟩
simp only [hp, hr, forall_const, eq_self_iff_true, subset_sphere, Sphere.ext_iff,
Set.forall_mem_range, mem_sphere] at h
-- Porting note: added the next three lines (`simp` less powerful)
rw [subset_sphere (s := ⟨p, r⟩)] at h
simp only [hp, hr, forall_const, eq_self_iff_true, subset_sphere, Sphere.ext_iff,
Set.forall_mem_range, mem_sphere, true_and] at h
exact h.2
/-- The circumradius is non-negative. -/
theorem circumradius_nonneg {n : ℕ} (s : Simplex ℝ P n) : 0 ≤ s.circumradius :=
s.dist_circumcenter_eq_circumradius 0 ▸ dist_nonneg
/-- The circumradius of a simplex with at least two points is
positive. -/
theorem circumradius_pos {n : ℕ} (s : Simplex ℝ P (n + 1)) : 0 < s.circumradius := by
refine lt_of_le_of_ne s.circumradius_nonneg ?_
intro h
have hr := s.dist_circumcenter_eq_circumradius
simp_rw [← h, dist_eq_zero] at hr
have h01 := s.independent.injective.ne (by simp : (0 : Fin (n + 2)) ≠ 1)
simp [hr] at h01
/-- The circumcenter of a 0-simplex equals its unique point. -/
theorem circumcenter_eq_point (s : Simplex ℝ P 0) (i : Fin 1) : s.circumcenter = s.points i := by
have h := s.circumcenter_mem_affineSpan
have : Unique (Fin 1) := ⟨⟨0, by decide⟩, fun a => by simp only [Fin.eq_zero]⟩
simp only [Set.range_unique, AffineSubspace.mem_affineSpan_singleton] at h
rw [h]
congr
simp only [eq_iff_true_of_subsingleton]
/-- The circumcenter of a 1-simplex equals its centroid. -/
theorem circumcenter_eq_centroid (s : Simplex ℝ P 1) :
s.circumcenter = Finset.univ.centroid ℝ s.points := by
have hr :
Set.Pairwise Set.univ fun i j : Fin 2 =>
dist (s.points i) (Finset.univ.centroid ℝ s.points) =
dist (s.points j) (Finset.univ.centroid ℝ s.points) := by
intro i hi j hj hij
rw [Finset.centroid_pair_fin, dist_eq_norm_vsub V (s.points i),
dist_eq_norm_vsub V (s.points j), vsub_vadd_eq_vsub_sub, vsub_vadd_eq_vsub_sub, ←
one_smul ℝ (s.points i -ᵥ s.points 0), ← one_smul ℝ (s.points j -ᵥ s.points 0)]
fin_cases i <;> fin_cases j <;> simp [-one_smul, ← sub_smul] <;> norm_num
rw [Set.pairwise_eq_iff_exists_eq] at hr
obtain ⟨r, hr⟩ := hr
exact
(s.eq_circumcenter_of_dist_eq
(centroid_mem_affineSpan_of_card_eq_add_one ℝ _ (Finset.card_fin 2)) fun i =>
hr i (Set.mem_univ _)).symm
/-- Reindexing a simplex along an `Equiv` of index types does not change the circumsphere. -/
@[simp]
theorem circumsphere_reindex {m n : ℕ} (s : Simplex ℝ P m) (e : Fin (m + 1) ≃ Fin (n + 1)) :
(s.reindex e).circumsphere = s.circumsphere := by
refine s.circumsphere_unique_dist_eq.2 _ ⟨?_, ?_⟩ <;> rw [← s.reindex_range_points e]
· exact (s.reindex e).circumsphere_unique_dist_eq.1.1
· exact (s.reindex e).circumsphere_unique_dist_eq.1.2
/-- Reindexing a simplex along an `Equiv` of index types does not change the circumcenter. -/
@[simp]
theorem circumcenter_reindex {m n : ℕ} (s : Simplex ℝ P m) (e : Fin (m + 1) ≃ Fin (n + 1)) :
(s.reindex e).circumcenter = s.circumcenter := by simp_rw [circumcenter, circumsphere_reindex]
/-- Reindexing a simplex along an `Equiv` of index types does not change the circumradius. -/
@[simp]
theorem circumradius_reindex {m n : ℕ} (s : Simplex ℝ P m) (e : Fin (m + 1) ≃ Fin (n + 1)) :
(s.reindex e).circumradius = s.circumradius := by simp_rw [circumradius, circumsphere_reindex]
attribute [local instance] AffineSubspace.toAddTorsor
theorem dist_circumcenter_sq_eq_sq_sub_circumradius {n : ℕ} {r : ℝ} (s : Simplex ℝ P n) {p₁ : P}
(h₁ : ∀ i : Fin (n + 1), dist (s.points i) p₁ = r)
(h₁' : ↑(s.orthogonalProjectionSpan p₁) = s.circumcenter)
(h : s.points 0 ∈ affineSpan ℝ (Set.range s.points)) :
dist p₁ s.circumcenter * dist p₁ s.circumcenter = r * r - s.circumradius * s.circumradius := by
rw [dist_comm, ← h₁ 0,
s.dist_sq_eq_dist_orthogonalProjection_sq_add_dist_orthogonalProjection_sq p₁ h]
simp only [h₁', dist_comm p₁, add_sub_cancel_left, Simplex.dist_circumcenter_eq_circumradius]
/-- If there exists a distance that a point has from all vertices of a
simplex, the orthogonal projection of that point onto the subspace
spanned by that simplex is its circumcenter. -/
theorem orthogonalProjection_eq_circumcenter_of_exists_dist_eq {n : ℕ} (s : Simplex ℝ P n) {p : P}
(hr : ∃ r, ∀ i, dist (s.points i) p = r) :
↑(s.orthogonalProjectionSpan p) = s.circumcenter := by
change ∃ r : ℝ, ∀ i, (fun x => dist x p = r) (s.points i) at hr
have hr : ∃ (r : ℝ), ∀ (a : P),
a ∈ Set.range (fun (i : Fin (n + 1)) => s.points i) → dist a p = r := by
obtain ⟨r, hr⟩ := hr
use r
refine Set.forall_mem_range.mpr ?_
exact hr
rw [exists_dist_eq_iff_exists_dist_orthogonalProjection_eq (subset_affineSpan ℝ _) p] at hr
obtain ⟨r, hr⟩ := hr
exact
s.eq_circumcenter_of_dist_eq (orthogonalProjection_mem p) fun i => hr _ (Set.mem_range_self i)
/-- If a point has the same distance from all vertices of a simplex,
the orthogonal projection of that point onto the subspace spanned by
that simplex is its circumcenter. -/
theorem orthogonalProjection_eq_circumcenter_of_dist_eq {n : ℕ} (s : Simplex ℝ P n) {p : P} {r : ℝ}
(hr : ∀ i, dist (s.points i) p = r) : ↑(s.orthogonalProjectionSpan p) = s.circumcenter :=
s.orthogonalProjection_eq_circumcenter_of_exists_dist_eq ⟨r, hr⟩
/-- The orthogonal projection of the circumcenter onto a face is the
circumcenter of that face. -/
theorem orthogonalProjection_circumcenter {n : ℕ} (s : Simplex ℝ P n) {fs : Finset (Fin (n + 1))}
{m : ℕ} (h : #fs = m + 1) :
↑((s.face h).orthogonalProjectionSpan s.circumcenter) = (s.face h).circumcenter :=
haveI hr : ∃ r, ∀ i, dist ((s.face h).points i) s.circumcenter = r := by
use s.circumradius
simp [face_points]
orthogonalProjection_eq_circumcenter_of_exists_dist_eq _ hr
/-- Two simplices with the same points have the same circumcenter. -/
theorem circumcenter_eq_of_range_eq {n : ℕ} {s₁ s₂ : Simplex ℝ P n}
(h : Set.range s₁.points = Set.range s₂.points) : s₁.circumcenter = s₂.circumcenter := by
| have hs : s₁.circumcenter ∈ affineSpan ℝ (Set.range s₂.points) :=
h ▸ s₁.circumcenter_mem_affineSpan
| Mathlib/Geometry/Euclidean/Circumcenter.lean | 401 | 402 |
/-
Copyright (c) 2021 David Wärn. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: David Wärn, Joachim Breitner
-/
import Mathlib.Algebra.Group.Action.End
import Mathlib.Algebra.Group.Action.Pointwise.Set.Basic
import Mathlib.Algebra.Group.Submonoid.Membership
import Mathlib.GroupTheory.Congruence.Basic
import Mathlib.GroupTheory.FreeGroup.IsFreeGroup
import Mathlib.SetTheory.Cardinal.Basic
/-!
# The coproduct (a.k.a. the free product) of groups or monoids
Given an `ι`-indexed family `M` of monoids,
we define their coproduct (a.k.a. free product) `Monoid.CoprodI M`.
As usual, we use the suffix `I` for an indexed (co)product,
leaving `Coprod` for the coproduct of two monoids.
When `ι` and all `M i` have decidable equality,
the free product bijects with the type `Monoid.CoprodI.Word M` of reduced words.
This bijection is constructed
by defining an action of `Monoid.CoprodI M` on `Monoid.CoprodI.Word M`.
When `M i` are all groups, `Monoid.CoprodI M` is also a group
(and the coproduct in the category of groups).
## Main definitions
- `Monoid.CoprodI M`: the free product, defined as a quotient of a free monoid.
- `Monoid.CoprodI.of {i} : M i →* Monoid.CoprodI M`.
- `Monoid.CoprodI.lift : (∀ {i}, M i →* N) ≃ (Monoid.CoprodI M →* N)`: the universal property.
- `Monoid.CoprodI.Word M`: the type of reduced words.
- `Monoid.CoprodI.Word.equiv M : Monoid.CoprodI M ≃ word M`.
- `Monoid.CoprodI.NeWord M i j`: an inductive description of non-empty words
with first letter from `M i` and last letter from `M j`,
together with an API (`singleton`, `append`, `head`, `tail`, `to_word`, `Prod`, `inv`).
Used in the proof of the Ping-Pong-lemma.
- `Monoid.CoprodI.lift_injective_of_ping_pong`: The Ping-Pong-lemma,
proving injectivity of the `lift`. See the documentation of that theorem for more information.
## Remarks
There are many answers to the question "what is the coproduct of a family `M` of monoids?",
and they are all equivalent but not obviously equivalent.
We provide two answers.
The first, almost tautological answer is given by `Monoid.CoprodI M`,
which is a quotient of the type of words in the alphabet `Σ i, M i`.
It's straightforward to define and easy to prove its universal property.
But this answer is not completely satisfactory,
because it's difficult to tell when two elements `x y : Monoid.CoprodI M` are distinct
since `Monoid.CoprodI M` is defined as a quotient.
The second, maximally efficient answer is given by `Monoid.CoprodI.Word M`.
An element of `Monoid.CoprodI.Word M` is a word in the alphabet `Σ i, M i`,
where the letter `⟨i, 1⟩` doesn't occur and no adjacent letters share an index `i`.
Since we only work with reduced words, there is no need for quotienting,
and it is easy to tell when two elements are distinct.
However it's not obvious that this is even a monoid!
We prove that every element of `Monoid.CoprodI M` can be represented by a unique reduced word,
i.e. `Monoid.CoprodI M` and `Monoid.CoprodI.Word M` are equivalent types.
This means that `Monoid.CoprodI.Word M` can be given a monoid structure,
and it lets us tell when two elements of `Monoid.CoprodI M` are distinct.
There is also a completely tautological, maximally inefficient answer
given by `MonCat.Colimits.ColimitType`.
Whereas `Monoid.CoprodI M` at least ensures that
(any instance of) associativity holds by reflexivity,
in this answer associativity holds because of quotienting.
Yet another answer, which is constructively more satisfying,
could be obtained by showing that `Monoid.CoprodI.Rel` is confluent.
## References
[van der Waerden, *Free products of groups*][MR25465]
-/
open Set
variable {ι : Type*} (M : ι → Type*) [∀ i, Monoid (M i)]
/-- A relation on the free monoid on alphabet `Σ i, M i`,
relating `⟨i, 1⟩` with `1` and `⟨i, x⟩ * ⟨i, y⟩` with `⟨i, x * y⟩`. -/
inductive Monoid.CoprodI.Rel : FreeMonoid (Σ i, M i) → FreeMonoid (Σ i, M i) → Prop
| of_one (i : ι) : Monoid.CoprodI.Rel (FreeMonoid.of ⟨i, 1⟩) 1
| of_mul {i : ι} (x y : M i) :
Monoid.CoprodI.Rel (FreeMonoid.of ⟨i, x⟩ * FreeMonoid.of ⟨i, y⟩) (FreeMonoid.of ⟨i, x * y⟩)
/-- The free product (categorical coproduct) of an indexed family of monoids. -/
def Monoid.CoprodI : Type _ := (conGen (Monoid.CoprodI.Rel M)).Quotient
-- The `Monoid` instance should be constructed by a deriving handler.
-- https://github.com/leanprover-community/mathlib4/issues/380
instance : Monoid (Monoid.CoprodI M) := by
delta Monoid.CoprodI; infer_instance
instance : Inhabited (Monoid.CoprodI M) :=
⟨1⟩
namespace Monoid.CoprodI
/-- The type of reduced words. A reduced word cannot contain a letter `1`, and no two adjacent
letters can come from the same summand. -/
@[ext]
structure Word where
/-- A `Word` is a `List (Σ i, M i)`, such that `1` is not in the list, and no
two adjacent letters are from the same summand -/
toList : List (Σi, M i)
/-- A reduced word does not contain `1` -/
ne_one : ∀ l ∈ toList, Sigma.snd l ≠ 1
/-- Adjacent letters are not from the same summand. -/
chain_ne : toList.Chain' fun l l' => Sigma.fst l ≠ Sigma.fst l'
variable {M}
/-- The inclusion of a summand into the free product. -/
def of {i : ι} : M i →* CoprodI M where
toFun x := Con.mk' _ (FreeMonoid.of <| Sigma.mk i x)
map_one' := (Con.eq _).mpr (ConGen.Rel.of _ _ (CoprodI.Rel.of_one i))
map_mul' x y := Eq.symm <| (Con.eq _).mpr (ConGen.Rel.of _ _ (CoprodI.Rel.of_mul x y))
theorem of_apply {i} (m : M i) : of m = Con.mk' _ (FreeMonoid.of <| Sigma.mk i m) :=
rfl
variable {N : Type*} [Monoid N]
/-- See note [partially-applied ext lemmas]. -/
-- Porting note: higher `ext` priority
@[ext 1100]
theorem ext_hom (f g : CoprodI M →* N) (h : ∀ i, f.comp (of : M i →* _) = g.comp of) : f = g :=
(MonoidHom.cancel_right Con.mk'_surjective).mp <|
FreeMonoid.hom_eq fun ⟨i, x⟩ => by
rw [MonoidHom.comp_apply, MonoidHom.comp_apply, ← of_apply]
unfold CoprodI
rw [← MonoidHom.comp_apply, ← MonoidHom.comp_apply, h]
/-- A map out of the free product corresponds to a family of maps out of the summands. This is the
universal property of the free product, characterizing it as a categorical coproduct. -/
@[simps symm_apply]
def lift : (∀ i, M i →* N) ≃ (CoprodI M →* N) where
toFun fi :=
Con.lift _ (FreeMonoid.lift fun p : Σi, M i => fi p.fst p.snd) <|
Con.conGen_le <| by
simp_rw [Con.ker_rel]
rintro _ _ (i | ⟨x, y⟩) <;> simp
invFun f _ := f.comp of
left_inv := by
intro fi
ext i x
rfl
right_inv := by
intro f
ext i x
rfl
@[simp]
theorem lift_comp_of {N} [Monoid N] (fi : ∀ i, M i →* N) i : (lift fi).comp of = fi i :=
congr_fun (lift.symm_apply_apply fi) i
@[simp]
theorem lift_of {N} [Monoid N] (fi : ∀ i, M i →* N) {i} (m : M i) : lift fi (of m) = fi i m :=
DFunLike.congr_fun (lift_comp_of ..) m
@[simp]
theorem lift_comp_of' {N} [Monoid N] (f : CoprodI M →* N) :
lift (fun i ↦ f.comp (of (i := i))) = f :=
lift.apply_symm_apply f
@[simp]
theorem lift_of' : lift (fun i ↦ (of : M i →* CoprodI M)) = .id (CoprodI M) :=
lift_comp_of' (.id _)
theorem of_leftInverse [DecidableEq ι] (i : ι) :
Function.LeftInverse (lift <| Pi.mulSingle i (MonoidHom.id (M i))) of := fun x => by
simp only [lift_of, Pi.mulSingle_eq_same, MonoidHom.id_apply]
theorem of_injective (i : ι) : Function.Injective (of : M i →* _) := by
classical exact (of_leftInverse i).injective
theorem mrange_eq_iSup {N} [Monoid N] (f : ∀ i, M i →* N) :
MonoidHom.mrange (lift f) = ⨆ i, MonoidHom.mrange (f i) := by
rw [lift, Equiv.coe_fn_mk, Con.lift_range, FreeMonoid.mrange_lift,
range_sigma_eq_iUnion_range, Submonoid.closure_iUnion]
simp only [MonoidHom.mclosure_range]
theorem lift_mrange_le {N} [Monoid N] (f : ∀ i, M i →* N) {s : Submonoid N} :
MonoidHom.mrange (lift f) ≤ s ↔ ∀ i, MonoidHom.mrange (f i) ≤ s := by
simp [mrange_eq_iSup]
@[simp]
theorem iSup_mrange_of : ⨆ i, MonoidHom.mrange (of : M i →* CoprodI M) = ⊤ := by
simp [← mrange_eq_iSup]
@[simp]
theorem mclosure_iUnion_range_of :
Submonoid.closure (⋃ i, Set.range (of : M i →* CoprodI M)) = ⊤ := by
simp [Submonoid.closure_iUnion]
@[elab_as_elim]
theorem induction_left {motive : CoprodI M → Prop} (m : CoprodI M) (one : motive 1)
(mul : ∀ {i} (m : M i) x, motive x → motive (of m * x)) : motive m := by
induction m using Submonoid.induction_of_closure_eq_top_left mclosure_iUnion_range_of with
| one => exact one
| mul x hx y ihy =>
obtain ⟨i, m, rfl⟩ : ∃ (i : ι) (m : M i), of m = x := by simpa using hx
exact mul m y ihy
@[elab_as_elim]
theorem induction_on {motive : CoprodI M → Prop} (m : CoprodI M) (one : motive 1)
(of : ∀ (i) (m : M i), motive (of m))
(mul : ∀ x y, motive x → motive y → motive (x * y)) : motive m := by
induction m using CoprodI.induction_left with
| one => exact one
| mul m x hx => exact mul _ _ (of _ _) hx
section Group
variable (G : ι → Type*) [∀ i, Group (G i)]
instance : Inv (CoprodI G) where
inv :=
MulOpposite.unop ∘ lift fun i => (of : G i →* _).op.comp (MulEquiv.inv' (G i)).toMonoidHom
theorem inv_def (x : CoprodI G) :
x⁻¹ =
MulOpposite.unop
(lift (fun i => (of : G i →* _).op.comp (MulEquiv.inv' (G i)).toMonoidHom) x) :=
rfl
instance : Group (CoprodI G) :=
{ inv_mul_cancel := by
intro m
rw [inv_def]
induction m using CoprodI.induction_on with
| one => rw [MonoidHom.map_one, MulOpposite.unop_one, one_mul]
| of m ih =>
change of _⁻¹ * of _ = 1
rw [← of.map_mul, inv_mul_cancel, of.map_one]
| mul x y ihx ihy =>
rw [MonoidHom.map_mul, MulOpposite.unop_mul, mul_assoc, ← mul_assoc _ x y, ihx, one_mul,
ihy] }
theorem lift_range_le {N} [Group N] (f : ∀ i, G i →* N) {s : Subgroup N}
(h : ∀ i, (f i).range ≤ s) : (lift f).range ≤ s := by
rintro _ ⟨x, rfl⟩
induction x using CoprodI.induction_on with
| one => exact s.one_mem
| of i x =>
simp only [lift_of, SetLike.mem_coe]
exact h i (Set.mem_range_self x)
| mul x y hx hy =>
simp only [map_mul, SetLike.mem_coe]
exact s.mul_mem hx hy
theorem range_eq_iSup {N} [Group N] (f : ∀ i, G i →* N) : (lift f).range = ⨆ i, (f i).range := by
apply le_antisymm (lift_range_le _ f fun i => le_iSup (fun i => MonoidHom.range (f i)) i)
apply iSup_le _
rintro i _ ⟨x, rfl⟩
exact ⟨of x, by simp only [lift_of]⟩
end Group
namespace Word
/-- The empty reduced word. -/
@[simps]
def empty : Word M where
toList := []
ne_one := by simp
chain_ne := List.chain'_nil
instance : Inhabited (Word M) :=
⟨empty⟩
/-- A reduced word determines an element of the free product, given by multiplication. -/
def prod (w : Word M) : CoprodI M :=
List.prod (w.toList.map fun l => of l.snd)
@[simp]
theorem prod_empty : prod (empty : Word M) = 1 :=
rfl
/-- `fstIdx w` is `some i` if the first letter of `w` is `⟨i, m⟩` with `m : M i`. If `w` is empty
then it's `none`. -/
def fstIdx (w : Word M) : Option ι :=
w.toList.head?.map Sigma.fst
theorem fstIdx_ne_iff {w : Word M} {i} :
fstIdx w ≠ some i ↔ ∀ l ∈ w.toList.head?, i ≠ Sigma.fst l :=
not_iff_not.mp <| by simp [fstIdx]
variable (M)
/-- Given an index `i : ι`, `Pair M i` is the type of pairs `(head, tail)` where `head : M i` and
`tail : Word M`, subject to the constraint that first letter of `tail` can't be `⟨i, m⟩`.
By prepending `head` to `tail`, one obtains a new word. We'll show that any word can be uniquely
obtained in this way. -/
@[ext]
structure Pair (i : ι) where
/-- An element of `M i`, the first letter of the word. -/
head : M i
/-- The remaining letters of the word, excluding the first letter -/
tail : Word M
/-- The index first letter of tail of a `Pair M i` is not equal to `i` -/
fstIdx_ne : fstIdx tail ≠ some i
instance (i : ι) : Inhabited (Pair M i) :=
⟨⟨1, empty, by tauto⟩⟩
variable {M}
/-- Construct a new `Word` without any reduction. The underlying list of
`cons m w _ _` is `⟨_, m⟩::w` -/
@[simps]
def cons {i} (m : M i) (w : Word M) (hmw : w.fstIdx ≠ some i) (h1 : m ≠ 1) : Word M :=
{ toList := ⟨i, m⟩ :: w.toList,
ne_one := by
simp only [List.mem_cons]
rintro l (rfl | hl)
· exact h1
· exact w.ne_one l hl
chain_ne := w.chain_ne.cons' (fstIdx_ne_iff.mp hmw) }
@[simp]
theorem fstIdx_cons {i} (m : M i) (w : Word M) (hmw : w.fstIdx ≠ some i) (h1 : m ≠ 1) :
fstIdx (cons m w hmw h1) = some i := by simp [cons, fstIdx]
@[simp]
theorem prod_cons (i) (m : M i) (w : Word M) (h1 : m ≠ 1) (h2 : w.fstIdx ≠ some i) :
prod (cons m w h2 h1) = of m * prod w := by
simp [cons, prod, List.map_cons, List.prod_cons]
section
variable [∀ i, DecidableEq (M i)]
/-- Given a pair `(head, tail)`, we can form a word by prepending `head` to `tail`, except if `head`
is `1 : M i` then we have to just return `Word` since we need the result to be reduced. -/
def rcons {i} (p : Pair M i) : Word M :=
if h : p.head = 1 then p.tail
else cons p.head p.tail p.fstIdx_ne h
@[simp]
theorem prod_rcons {i} (p : Pair M i) : prod (rcons p) = of p.head * prod p.tail :=
if hm : p.head = 1 then by rw [rcons, dif_pos hm, hm, MonoidHom.map_one, one_mul]
else by rw [rcons, dif_neg hm, cons, prod, List.map_cons, List.prod_cons, prod]
theorem rcons_inj {i} : Function.Injective (rcons : Pair M i → Word M) := by
rintro ⟨m, w, h⟩ ⟨m', w', h'⟩ he
by_cases hm : m = 1 <;> by_cases hm' : m' = 1
· simp only [rcons, dif_pos hm, dif_pos hm'] at he
aesop
· exfalso
simp only [rcons, dif_pos hm, dif_neg hm'] at he
rw [he] at h
exact h rfl
· exfalso
simp only [rcons, dif_pos hm', dif_neg hm] at he
rw [← he] at h'
exact h' rfl
· have : m = m' ∧ w.toList = w'.toList := by
simpa [cons, rcons, dif_neg hm, dif_neg hm', eq_self_iff_true, Subtype.mk_eq_mk,
heq_iff_eq, ← Subtype.ext_iff_val] using he
rcases this with ⟨rfl, h⟩
congr
exact Word.ext h
theorem mem_rcons_iff {i j : ι} (p : Pair M i) (m : M j) :
⟨_, m⟩ ∈ (rcons p).toList ↔ ⟨_, m⟩ ∈ p.tail.toList ∨
m ≠ 1 ∧ (∃ h : i = j, m = h ▸ p.head) := by
simp only [rcons, cons, ne_eq]
by_cases hij : i = j
· subst i
by_cases hm : m = p.head
· subst m
split_ifs <;> simp_all
· split_ifs <;> simp_all
· split_ifs <;> simp_all [Ne.symm hij]
end
/-- Induct on a word by adding letters one at a time without reduction,
effectively inducting on the underlying `List`. -/
@[elab_as_elim]
def consRecOn {motive : Word M → Sort*} (w : Word M) (empty : motive empty)
(cons : ∀ (i) (m : M i) (w) h1 h2, motive w → motive (cons m w h1 h2)) :
motive w := by
rcases w with ⟨w, h1, h2⟩
induction w with
| | nil => exact empty
| cons m w ih =>
refine cons m.1 m.2 ⟨w, fun _ hl => h1 _ (List.mem_cons_of_mem _ hl), h2.tail⟩ ?_ ?_ (ih _ _)
· rw [List.chain'_cons'] at h2
simp only [fstIdx, ne_eq, Option.map_eq_some_iff,
Sigma.exists, exists_and_right, exists_eq_right, not_exists]
intro m' hm'
exact h2.1 _ hm' rfl
· exact h1 _ List.mem_cons_self
@[simp]
| Mathlib/GroupTheory/CoprodI.lean | 393 | 403 |
/-
Copyright (c) 2017 Johannes Hölzl. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johannes Hölzl, Johan Commelin, Mario Carneiro
-/
import Mathlib.Algebra.BigOperators.Finsupp.Fin
import Mathlib.Algebra.MvPolynomial.Degrees
import Mathlib.Algebra.MvPolynomial.Rename
import Mathlib.Algebra.Polynomial.AlgebraMap
import Mathlib.Algebra.Polynomial.Degree.Lemmas
import Mathlib.Logic.Equiv.Fin.Basic
/-!
# Equivalences between polynomial rings
This file establishes a number of equivalences between polynomial rings,
based on equivalences between the underlying types.
## Notation
As in other polynomial files, we typically use the notation:
+ `σ : Type*` (indexing the variables)
+ `R : Type*` `[CommSemiring R]` (the coefficients)
+ `s : σ →₀ ℕ`, a function from `σ` to `ℕ` which is zero away from a finite set.
This will give rise to a monomial in `MvPolynomial σ R` which mathematicians might call `X^s`
+ `a : R`
+ `i : σ`, with corresponding monomial `X i`, often denoted `X_i` by mathematicians
+ `p : MvPolynomial σ R`
## Tags
equivalence, isomorphism, morphism, ring hom, hom
-/
noncomputable section
open Polynomial Set Function Finsupp AddMonoidAlgebra
universe u v w x
variable {R : Type u} {S₁ : Type v} {S₂ : Type w} {S₃ : Type x}
namespace MvPolynomial
variable {σ : Type*} {a a' a₁ a₂ : R} {e : ℕ} {s : σ →₀ ℕ}
section Equiv
variable (R) [CommSemiring R]
/-- The ring isomorphism between multivariable polynomials in a single variable and
polynomials over the ground ring.
-/
@[simps]
def pUnitAlgEquiv : MvPolynomial PUnit R ≃ₐ[R] R[X] where
toFun := eval₂ Polynomial.C fun _ => Polynomial.X
invFun := Polynomial.eval₂ MvPolynomial.C (X PUnit.unit)
left_inv := by
let f : R[X] →+* MvPolynomial PUnit R := Polynomial.eval₂RingHom MvPolynomial.C (X PUnit.unit)
let g : MvPolynomial PUnit R →+* R[X] := eval₂Hom Polynomial.C fun _ => Polynomial.X
show ∀ p, f.comp g p = p
apply is_id
· ext a
dsimp [f, g]
rw [eval₂_C, Polynomial.eval₂_C]
· rintro ⟨⟩
dsimp [f, g]
rw [eval₂_X, Polynomial.eval₂_X]
right_inv p :=
Polynomial.induction_on p (fun a => by rw [Polynomial.eval₂_C, MvPolynomial.eval₂_C])
(fun p q hp hq => by rw [Polynomial.eval₂_add, MvPolynomial.eval₂_add, hp, hq]) fun p n _ => by
rw [Polynomial.eval₂_mul, Polynomial.eval₂_pow, Polynomial.eval₂_X, Polynomial.eval₂_C,
eval₂_mul, eval₂_C, eval₂_pow, eval₂_X]
map_mul' _ _ := eval₂_mul _ _
map_add' _ _ := eval₂_add _ _
commutes' _ := eval₂_C _ _ _
theorem pUnitAlgEquiv_monomial {d : PUnit →₀ ℕ} {r : R} :
MvPolynomial.pUnitAlgEquiv R (MvPolynomial.monomial d r)
= Polynomial.monomial (d ()) r := by
simp [Polynomial.C_mul_X_pow_eq_monomial]
theorem pUnitAlgEquiv_symm_monomial {d : PUnit →₀ ℕ} {r : R} :
(MvPolynomial.pUnitAlgEquiv R).symm (Polynomial.monomial (d ()) r)
= MvPolynomial.monomial d r := by
simp [MvPolynomial.monomial_eq]
section Map
variable {R} (σ)
/-- If `e : A ≃+* B` is an isomorphism of rings, then so is `map e`. -/
@[simps apply]
def mapEquiv [CommSemiring S₁] [CommSemiring S₂] (e : S₁ ≃+* S₂) :
MvPolynomial σ S₁ ≃+* MvPolynomial σ S₂ :=
{ map (e : S₁ →+* S₂) with
toFun := map (e : S₁ →+* S₂)
invFun := map (e.symm : S₂ →+* S₁)
left_inv := map_leftInverse e.left_inv
right_inv := map_rightInverse e.right_inv }
@[simp]
theorem mapEquiv_refl : mapEquiv σ (RingEquiv.refl R) = RingEquiv.refl _ :=
RingEquiv.ext map_id
@[simp]
theorem mapEquiv_symm [CommSemiring S₁] [CommSemiring S₂] (e : S₁ ≃+* S₂) :
(mapEquiv σ e).symm = mapEquiv σ e.symm :=
rfl
@[simp]
theorem mapEquiv_trans [CommSemiring S₁] [CommSemiring S₂] [CommSemiring S₃] (e : S₁ ≃+* S₂)
(f : S₂ ≃+* S₃) : (mapEquiv σ e).trans (mapEquiv σ f) = mapEquiv σ (e.trans f) :=
RingEquiv.ext fun p => by
simp only [RingEquiv.coe_trans, comp_apply, mapEquiv_apply, RingEquiv.coe_ringHom_trans,
map_map]
variable {A₁ A₂ A₃ : Type*} [CommSemiring A₁] [CommSemiring A₂] [CommSemiring A₃]
variable [Algebra R A₁] [Algebra R A₂] [Algebra R A₃]
/-- If `e : A ≃ₐ[R] B` is an isomorphism of `R`-algebras, then so is `map e`. -/
@[simps apply]
def mapAlgEquiv (e : A₁ ≃ₐ[R] A₂) : MvPolynomial σ A₁ ≃ₐ[R] MvPolynomial σ A₂ :=
{ mapAlgHom (e : A₁ →ₐ[R] A₂), mapEquiv σ (e : A₁ ≃+* A₂) with toFun := map (e : A₁ →+* A₂) }
@[simp]
theorem mapAlgEquiv_refl : mapAlgEquiv σ (AlgEquiv.refl : A₁ ≃ₐ[R] A₁) = AlgEquiv.refl :=
AlgEquiv.ext map_id
@[simp]
theorem mapAlgEquiv_symm (e : A₁ ≃ₐ[R] A₂) : (mapAlgEquiv σ e).symm = mapAlgEquiv σ e.symm :=
rfl
@[simp]
theorem mapAlgEquiv_trans (e : A₁ ≃ₐ[R] A₂) (f : A₂ ≃ₐ[R] A₃) :
(mapAlgEquiv σ e).trans (mapAlgEquiv σ f) = mapAlgEquiv σ (e.trans f) := by
ext
simp only [AlgEquiv.trans_apply, mapAlgEquiv_apply, map_map]
rfl
end Map
section Eval
variable {R S : Type*} [CommSemiring R] [CommSemiring S]
theorem eval₂_pUnitAlgEquiv_symm {f : Polynomial R} {φ : R →+* S} {a : Unit → S} :
((MvPolynomial.pUnitAlgEquiv R).symm f : MvPolynomial Unit R).eval₂ φ a =
f.eval₂ φ (a ()) := by
simp only [MvPolynomial.pUnitAlgEquiv_symm_apply]
induction f using Polynomial.induction_on' with
| add f g hf hg => simp [hf, hg]
| monomial n r => simp
theorem eval₂_const_pUnitAlgEquiv_symm {f : Polynomial R} {φ : R →+* S} {a : S} :
((MvPolynomial.pUnitAlgEquiv R).symm f : MvPolynomial Unit R).eval₂ φ (fun _ ↦ a) =
f.eval₂ φ a := by
rw [eval₂_pUnitAlgEquiv_symm]
theorem eval₂_pUnitAlgEquiv {f : MvPolynomial PUnit R} {φ : R →+* S} {a : PUnit → S} :
((MvPolynomial.pUnitAlgEquiv R) f : Polynomial R).eval₂ φ (a default) = f.eval₂ φ a := by
simp only [MvPolynomial.pUnitAlgEquiv_apply]
induction f using MvPolynomial.induction_on' with
| monomial d r => simp
| add f g hf hg => simp [hf, hg]
theorem eval₂_const_pUnitAlgEquiv {f : MvPolynomial PUnit R} {φ : R →+* S} {a : S} :
((MvPolynomial.pUnitAlgEquiv R) f : Polynomial R).eval₂ φ a = f.eval₂ φ (fun _ ↦ a) := by
rw [← eval₂_pUnitAlgEquiv]
end Eval
section
variable (S₁ S₂ S₃)
/-- The function from multivariable polynomials in a sum of two types,
to multivariable polynomials in one of the types,
with coefficients in multivariable polynomials in the other type.
See `sumRingEquiv` for the ring isomorphism.
-/
def sumToIter : MvPolynomial (S₁ ⊕ S₂) R →+* MvPolynomial S₁ (MvPolynomial S₂ R) :=
eval₂Hom (C.comp C) fun bc => Sum.recOn bc X (C ∘ X)
@[simp]
theorem sumToIter_C (a : R) : sumToIter R S₁ S₂ (C a) = C (C a) :=
eval₂_C _ _ a
@[simp]
theorem sumToIter_Xl (b : S₁) : sumToIter R S₁ S₂ (X (Sum.inl b)) = X b :=
eval₂_X _ _ (Sum.inl b)
@[simp]
theorem sumToIter_Xr (c : S₂) : sumToIter R S₁ S₂ (X (Sum.inr c)) = C (X c) :=
eval₂_X _ _ (Sum.inr c)
/-- The function from multivariable polynomials in one type,
with coefficients in multivariable polynomials in another type,
to multivariable polynomials in the sum of the two types.
See `sumRingEquiv` for the ring isomorphism.
-/
def iterToSum : MvPolynomial S₁ (MvPolynomial S₂ R) →+* MvPolynomial (S₁ ⊕ S₂) R :=
eval₂Hom (eval₂Hom C (X ∘ Sum.inr)) (X ∘ Sum.inl)
@[simp]
theorem iterToSum_C_C (a : R) : iterToSum R S₁ S₂ (C (C a)) = C a :=
Eq.trans (eval₂_C _ _ (C a)) (eval₂_C _ _ _)
@[simp]
theorem iterToSum_X (b : S₁) : iterToSum R S₁ S₂ (X b) = X (Sum.inl b) :=
eval₂_X _ _ _
@[simp]
theorem iterToSum_C_X (c : S₂) : iterToSum R S₁ S₂ (C (X c)) = X (Sum.inr c) :=
Eq.trans (eval₂_C _ _ (X c)) (eval₂_X _ _ _)
section isEmptyRingEquiv
variable [IsEmpty σ]
variable (σ) in
/-- The algebra isomorphism between multivariable polynomials in no variables
and the ground ring. -/
@[simps! apply]
def isEmptyAlgEquiv : MvPolynomial σ R ≃ₐ[R] R :=
.ofAlgHom (aeval isEmptyElim) (Algebra.ofId _ _) (by ext) (by ext i m; exact isEmptyElim i)
variable {R S₁} in
@[simp]
lemma aeval_injective_iff_of_isEmpty [CommSemiring S₁] [Algebra R S₁] {f : σ → S₁} :
Function.Injective (aeval f : MvPolynomial σ R →ₐ[R] S₁) ↔
Function.Injective (algebraMap R S₁) := by
have : aeval f = (Algebra.ofId R S₁).comp (@isEmptyAlgEquiv R σ _ _).toAlgHom := by
ext i
exact IsEmpty.elim' ‹IsEmpty σ› i
rw [this, ← Injective.of_comp_iff' _ (@isEmptyAlgEquiv R σ _ _).bijective]
rfl
variable (σ) in
/-- The ring isomorphism between multivariable polynomials in no variables
and the ground ring. -/
@[simps! apply]
def isEmptyRingEquiv : MvPolynomial σ R ≃+* R := (isEmptyAlgEquiv R σ).toRingEquiv
lemma isEmptyRingEquiv_symm_toRingHom : (isEmptyRingEquiv R σ).symm.toRingHom = C := rfl
@[simp] lemma isEmptyRingEquiv_symm_apply (r : R) : (isEmptyRingEquiv R σ).symm r = C r := rfl
lemma isEmptyRingEquiv_eq_coeff_zero {σ R : Type*} [CommSemiring R] [IsEmpty σ] {x} :
isEmptyRingEquiv R σ x = x.coeff 0 := by
obtain ⟨x, rfl⟩ := (isEmptyRingEquiv R σ).symm.surjective x; simp
end isEmptyRingEquiv
/-- A helper function for `sumRingEquiv`. -/
@[simps]
def mvPolynomialEquivMvPolynomial [CommSemiring S₃] (f : MvPolynomial S₁ R →+* MvPolynomial S₂ S₃)
(g : MvPolynomial S₂ S₃ →+* MvPolynomial S₁ R) (hfgC : (f.comp g).comp C = C)
(hfgX : ∀ n, f (g (X n)) = X n) (hgfC : (g.comp f).comp C = C) (hgfX : ∀ n, g (f (X n)) = X n) :
MvPolynomial S₁ R ≃+* MvPolynomial S₂ S₃ where
toFun := f
invFun := g
left_inv := is_id (RingHom.comp _ _) hgfC hgfX
right_inv := is_id (RingHom.comp _ _) hfgC hfgX
map_mul' := f.map_mul
map_add' := f.map_add
/-- The ring isomorphism between multivariable polynomials in a sum of two types,
and multivariable polynomials in one of the types,
with coefficients in multivariable polynomials in the other type.
-/
def sumRingEquiv : MvPolynomial (S₁ ⊕ S₂) R ≃+* MvPolynomial S₁ (MvPolynomial S₂ R) := by
apply mvPolynomialEquivMvPolynomial R (S₁ ⊕ S₂) _ _ (sumToIter R S₁ S₂) (iterToSum R S₁ S₂)
· refine RingHom.ext (hom_eq_hom _ _ ?hC ?hX)
case hC => ext1; simp only [RingHom.comp_apply, iterToSum_C_C, sumToIter_C]
case hX => intro; simp only [RingHom.comp_apply, iterToSum_C_X, sumToIter_Xr]
· simp [iterToSum_X, sumToIter_Xl]
· ext1; simp only [RingHom.comp_apply, sumToIter_C, iterToSum_C_C]
· rintro ⟨⟩ <;> simp only [sumToIter_Xl, iterToSum_X, sumToIter_Xr, iterToSum_C_X]
/-- The algebra isomorphism between multivariable polynomials in a sum of two types,
and multivariable polynomials in one of the types,
with coefficients in multivariable polynomials in the other type.
-/
@[simps!]
def sumAlgEquiv : MvPolynomial (S₁ ⊕ S₂) R ≃ₐ[R] MvPolynomial S₁ (MvPolynomial S₂ R) :=
{ sumRingEquiv R S₁ S₂ with
commutes' := by
intro r
have A : algebraMap R (MvPolynomial S₁ (MvPolynomial S₂ R)) r = (C (C r) :) := rfl
have B : algebraMap R (MvPolynomial (S₁ ⊕ S₂) R) r = C r := rfl
simp only [sumRingEquiv, mvPolynomialEquivMvPolynomial, Equiv.toFun_as_coe,
Equiv.coe_fn_mk, B, sumToIter_C, A] }
lemma sumAlgEquiv_comp_rename_inr :
(sumAlgEquiv R S₁ S₂).toAlgHom.comp (rename Sum.inr) = IsScalarTower.toAlgHom R
(MvPolynomial S₂ R) (MvPolynomial S₁ (MvPolynomial S₂ R)) := by
ext i
simp
lemma sumAlgEquiv_comp_rename_inl :
(sumAlgEquiv R S₁ S₂).toAlgHom.comp (rename Sum.inl) =
MvPolynomial.mapAlgHom (Algebra.ofId _ _) := by
ext i
simp
section commAlgEquiv
variable {R S₁ S₂ : Type*} [CommSemiring R]
variable (R S₁ S₂) in
/-- The algebra isomorphism between multivariable polynomials in variables `S₁` of multivariable
polynomials in variables `S₂` and multivariable polynomials in variables `S₂` of multivariable
polynomials in variables `S₁`. -/
noncomputable
def commAlgEquiv : MvPolynomial S₁ (MvPolynomial S₂ R) ≃ₐ[R] MvPolynomial S₂ (MvPolynomial S₁ R) :=
(sumAlgEquiv R S₁ S₂).symm.trans <| (renameEquiv _ (.sumComm S₁ S₂)).trans (sumAlgEquiv R S₂ S₁)
@[simp] lemma commAlgEquiv_C (p) : commAlgEquiv R S₁ S₂ (.C p) = .map C p := by
suffices (commAlgEquiv R S₁ S₂).toAlgHom.comp
(IsScalarTower.toAlgHom R (MvPolynomial S₂ R) _) = mapAlgHom (Algebra.ofId _ _) by
exact DFunLike.congr_fun this p
ext x : 1
simp [commAlgEquiv]
lemma commAlgEquiv_C_X (i) : commAlgEquiv R S₁ S₂ (.C (.X i)) = .X i := by simp
@[simp] lemma commAlgEquiv_X (i) : commAlgEquiv R S₁ S₂ (.X i) = .C (.X i) := by simp [commAlgEquiv]
end commAlgEquiv
section
-- this speeds up typeclass search in the lemma below
attribute [local instance] IsScalarTower.right
/-- The algebra isomorphism between multivariable polynomials in `Option S₁` and
polynomials with coefficients in `MvPolynomial S₁ R`.
-/
@[simps! -isSimp]
def optionEquivLeft : MvPolynomial (Option S₁) R ≃ₐ[R] Polynomial (MvPolynomial S₁ R) :=
AlgEquiv.ofAlgHom (MvPolynomial.aeval fun o => o.elim Polynomial.X fun s => Polynomial.C (X s))
(Polynomial.aevalTower (MvPolynomial.rename some) (X none))
(by ext : 2 <;> simp) (by ext i : 2; cases i <;> simp)
lemma optionEquivLeft_X_some (x : S₁) : optionEquivLeft R S₁ (X (some x)) = Polynomial.C (X x) := by
simp [optionEquivLeft_apply, aeval_X]
lemma optionEquivLeft_X_none : optionEquivLeft R S₁ (X none) = Polynomial.X := by
simp [optionEquivLeft_apply, aeval_X]
lemma optionEquivLeft_C (r : R) : optionEquivLeft R S₁ (C r) = Polynomial.C (C r) := by
simp only [optionEquivLeft_apply, aeval_C, Polynomial.algebraMap_apply, algebraMap_eq]
theorem optionEquivLeft_monomial (m : Option S₁ →₀ ℕ) (r : R) :
optionEquivLeft R S₁ (monomial m r) = .monomial (m none) (monomial m.some r) := by
rw [optionEquivLeft_apply, aeval_monomial, prod_option_index]
· rw [MvPolynomial.monomial_eq, ← Polynomial.C_mul_X_pow_eq_monomial]
simp only [Polynomial.algebraMap_apply, algebraMap_eq, Option.elim_none, Option.elim_some,
map_mul, mul_assoc]
apply congr_arg₂ _ rfl
simp only [mul_comm, map_finsuppProd, map_pow]
· intros; simp
· intros; rw [pow_add]
| /-- The coefficient of `n.some` in the `n none`-th coefficient of `optionEquivLeft R S₁ f`
| Mathlib/Algebra/MvPolynomial/Equiv.lean | 373 | 373 |
/-
Copyright (c) 2018 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes, Abhimanyu Pallavi Sudhir, Jean Lo, Calle Sönne, Benjamin Davidson
-/
import Mathlib.Analysis.SpecialFunctions.Trigonometric.Complex
/-!
# The `arctan` function.
Inequalities, identities and `Real.tan` as a `PartialHomeomorph` between `(-(π / 2), π / 2)`
and the whole line.
The result of `arctan x + arctan y` is given by `arctan_add`, `arctan_add_eq_add_pi` or
`arctan_add_eq_sub_pi` depending on whether `x * y < 1` and `0 < x`. As an application of
`arctan_add` we give four Machin-like formulas (linear combinations of arctangents equal to
`π / 4 = arctan 1`), including John Machin's original one at
`four_mul_arctan_inv_5_sub_arctan_inv_239`.
-/
noncomputable section
namespace Real
open Set Filter
open scoped Topology Real
theorem tan_add {x y : ℝ}
(h : ((∀ k : ℤ, x ≠ (2 * k + 1) * π / 2) ∧ ∀ l : ℤ, y ≠ (2 * l + 1) * π / 2) ∨
(∃ k : ℤ, x = (2 * k + 1) * π / 2) ∧ ∃ l : ℤ, y = (2 * l + 1) * π / 2) :
tan (x + y) = (tan x + tan y) / (1 - tan x * tan y) := by
simpa only [← Complex.ofReal_inj, Complex.ofReal_sub, Complex.ofReal_add, Complex.ofReal_div,
Complex.ofReal_mul, Complex.ofReal_tan] using
@Complex.tan_add (x : ℂ) (y : ℂ) (by convert h <;> norm_cast)
theorem tan_add' {x y : ℝ}
(h : (∀ k : ℤ, x ≠ (2 * k + 1) * π / 2) ∧ ∀ l : ℤ, y ≠ (2 * l + 1) * π / 2) :
tan (x + y) = (tan x + tan y) / (1 - tan x * tan y) :=
tan_add (Or.inl h)
theorem tan_two_mul {x : ℝ} : tan (2 * x) = 2 * tan x / (1 - tan x ^ 2) := by
have := @Complex.tan_two_mul x
norm_cast at *
theorem tan_int_mul_pi_div_two (n : ℤ) : tan (n * π / 2) = 0 :=
tan_eq_zero_iff.mpr (by use n)
theorem continuousOn_tan : ContinuousOn tan {x | cos x ≠ 0} := by
suffices ContinuousOn (fun x => sin x / cos x) {x | cos x ≠ 0} by
have h_eq : (fun x => sin x / cos x) = tan := by ext1 x; rw [tan_eq_sin_div_cos]
rwa [h_eq] at this
exact continuousOn_sin.div continuousOn_cos fun x => id
@[continuity]
theorem continuous_tan : Continuous fun x : {x | cos x ≠ 0} => tan x :=
continuousOn_iff_continuous_restrict.1 continuousOn_tan
theorem continuousOn_tan_Ioo : ContinuousOn tan (Ioo (-(π / 2)) (π / 2)) := by
refine ContinuousOn.mono continuousOn_tan fun x => ?_
simp only [and_imp, mem_Ioo, mem_setOf_eq, Ne]
rw [cos_eq_zero_iff]
rintro hx_gt hx_lt ⟨r, hxr_eq⟩
rcases le_or_lt 0 r with h | h
· rw [lt_iff_not_ge] at hx_lt
refine hx_lt ?_
rw [hxr_eq, ← one_mul (π / 2), mul_div_assoc, ge_iff_le, mul_le_mul_right (half_pos pi_pos)]
simp [h]
· rw [lt_iff_not_ge] at hx_gt
refine hx_gt ?_
rw [hxr_eq, ← one_mul (π / 2), mul_div_assoc, ge_iff_le, neg_mul_eq_neg_mul,
mul_le_mul_right (half_pos pi_pos)]
have hr_le : r ≤ -1 := by rwa [Int.lt_iff_add_one_le, ← le_neg_iff_add_nonpos_right] at h
rw [← le_sub_iff_add_le, mul_comm, ← le_div_iff₀]
· norm_num
rw [← Int.cast_one, ← Int.cast_neg]; norm_cast
· exact zero_lt_two
theorem surjOn_tan : SurjOn tan (Ioo (-(π / 2)) (π / 2)) univ :=
have := neg_lt_self pi_div_two_pos
continuousOn_tan_Ioo.surjOn_of_tendsto (nonempty_Ioo.2 this)
(by rw [tendsto_comp_coe_Ioo_atBot this]; exact tendsto_tan_neg_pi_div_two)
(by rw [tendsto_comp_coe_Ioo_atTop this]; exact tendsto_tan_pi_div_two)
theorem tan_surjective : Function.Surjective tan := fun _ => surjOn_tan.subset_range trivial
theorem image_tan_Ioo : tan '' Ioo (-(π / 2)) (π / 2) = univ :=
univ_subset_iff.1 surjOn_tan
/-- `Real.tan` as an `OrderIso` between `(-(π / 2), π / 2)` and `ℝ`. -/
def tanOrderIso : Ioo (-(π / 2)) (π / 2) ≃o ℝ :=
(strictMonoOn_tan.orderIso _ _).trans <|
(OrderIso.setCongr _ _ image_tan_Ioo).trans OrderIso.Set.univ
/-- Inverse of the `tan` function, returns values in the range `-π / 2 < arctan x` and
`arctan x < π / 2` -/
@[pp_nodot]
noncomputable def arctan (x : ℝ) : ℝ :=
tanOrderIso.symm x
@[simp]
theorem tan_arctan (x : ℝ) : tan (arctan x) = x :=
tanOrderIso.apply_symm_apply x
theorem arctan_mem_Ioo (x : ℝ) : arctan x ∈ Ioo (-(π / 2)) (π / 2) :=
Subtype.coe_prop _
@[simp]
theorem range_arctan : range arctan = Ioo (-(π / 2)) (π / 2) :=
((EquivLike.surjective _).range_comp _).trans Subtype.range_coe
theorem arctan_tan {x : ℝ} (hx₁ : -(π / 2) < x) (hx₂ : x < π / 2) : arctan (tan x) = x :=
Subtype.ext_iff.1 <| tanOrderIso.symm_apply_apply ⟨x, hx₁, hx₂⟩
theorem cos_arctan_pos (x : ℝ) : 0 < cos (arctan x) :=
cos_pos_of_mem_Ioo <| arctan_mem_Ioo x
theorem cos_sq_arctan (x : ℝ) : cos (arctan x) ^ 2 = 1 / (1 + x ^ 2) := by
rw_mod_cast [one_div, ← inv_one_add_tan_sq (cos_arctan_pos x).ne', tan_arctan]
theorem sin_arctan (x : ℝ) : sin (arctan x) = x / √(1 + x ^ 2) := by
rw_mod_cast [← tan_div_sqrt_one_add_tan_sq (cos_arctan_pos x), tan_arctan]
theorem cos_arctan (x : ℝ) : cos (arctan x) = 1 / √(1 + x ^ 2) := by
rw_mod_cast [one_div, ← inv_sqrt_one_add_tan_sq (cos_arctan_pos x), tan_arctan]
theorem arctan_lt_pi_div_two (x : ℝ) : arctan x < π / 2 :=
(arctan_mem_Ioo x).2
theorem neg_pi_div_two_lt_arctan (x : ℝ) : -(π / 2) < arctan x :=
(arctan_mem_Ioo x).1
theorem arctan_eq_arcsin (x : ℝ) : arctan x = arcsin (x / √(1 + x ^ 2)) :=
Eq.symm <| arcsin_eq_of_sin_eq (sin_arctan x) (mem_Icc_of_Ioo <| arctan_mem_Ioo x)
theorem arcsin_eq_arctan {x : ℝ} (h : x ∈ Ioo (-(1 : ℝ)) 1) :
arcsin x = arctan (x / √(1 - x ^ 2)) := by
rw_mod_cast [arctan_eq_arcsin, div_pow, sq_sqrt, one_add_div, div_div, ← sqrt_mul,
mul_div_cancel₀, sub_add_cancel, sqrt_one, div_one] <;> simp at h <;> nlinarith [h.1, h.2]
@[simp]
theorem arctan_zero : arctan 0 = 0 := by simp [arctan_eq_arcsin]
@[mono]
theorem arctan_strictMono : StrictMono arctan := tanOrderIso.symm.strictMono
@[gcongr]
lemma arctan_lt_arctan {x y : ℝ} (hxy : x < y) : arctan x < arctan y := arctan_strictMono hxy
@[gcongr]
lemma arctan_le_arctan {x y : ℝ} (hxy : x ≤ y) : arctan x ≤ arctan y :=
arctan_strictMono.monotone hxy
theorem arctan_injective : arctan.Injective := arctan_strictMono.injective
@[simp]
theorem arctan_eq_zero_iff {x : ℝ} : arctan x = 0 ↔ x = 0 :=
.trans (by rw [arctan_zero]) arctan_injective.eq_iff
theorem tendsto_arctan_atTop : Tendsto arctan atTop (𝓝[<] (π / 2)) :=
tendsto_Ioo_atTop.mp tanOrderIso.symm.tendsto_atTop
theorem tendsto_arctan_atBot : Tendsto arctan atBot (𝓝[>] (-(π / 2))) :=
tendsto_Ioo_atBot.mp tanOrderIso.symm.tendsto_atBot
theorem arctan_eq_of_tan_eq {x y : ℝ} (h : tan x = y) (hx : x ∈ Ioo (-(π / 2)) (π / 2)) :
arctan y = x :=
injOn_tan (arctan_mem_Ioo _) hx (by rw [tan_arctan, h])
@[simp]
theorem arctan_one : arctan 1 = π / 4 :=
arctan_eq_of_tan_eq tan_pi_div_four <| by constructor <;> linarith [pi_pos]
@[simp]
theorem arctan_neg (x : ℝ) : arctan (-x) = -arctan x := by simp [arctan_eq_arcsin, neg_div]
theorem arctan_eq_arccos {x : ℝ} (h : 0 ≤ x) : arctan x = arccos (√(1 + x ^ 2))⁻¹ := by
rw [arctan_eq_arcsin, arccos_eq_arcsin]; swap; · exact inv_nonneg.2 (sqrt_nonneg _)
congr 1
rw_mod_cast [← sqrt_inv, sq_sqrt, ← one_div, one_sub_div, add_sub_cancel_left, sqrt_div,
sqrt_sq h]
all_goals positivity
-- The junk values for `arccos` and `sqrt` make this true even for `1 < x`.
theorem arccos_eq_arctan {x : ℝ} (h : 0 < x) : arccos x = arctan (√(1 - x ^ 2) / x) := by
rw [arccos, eq_comm]
refine arctan_eq_of_tan_eq ?_ ⟨?_, ?_⟩
· rw_mod_cast [tan_pi_div_two_sub, tan_arcsin, inv_div]
· linarith only [arcsin_le_pi_div_two x, pi_pos]
· linarith only [arcsin_pos.2 h]
theorem arctan_inv_of_pos {x : ℝ} (h : 0 < x) : arctan x⁻¹ = π / 2 - arctan x := by
rw [← arctan_tan (x := _ - _), tan_pi_div_two_sub, tan_arctan]
· norm_num
exact (arctan_lt_pi_div_two x).trans (half_lt_self_iff.mpr pi_pos)
· rw [sub_lt_self_iff, ← arctan_zero]
exact tanOrderIso.symm.strictMono h
theorem arctan_inv_of_neg {x : ℝ} (h : x < 0) : arctan x⁻¹ = -(π / 2) - arctan x := by
have := arctan_inv_of_pos (neg_pos.mpr h)
rwa [inv_neg, arctan_neg, neg_eq_iff_eq_neg, neg_sub', arctan_neg, neg_neg] at this
section ArctanAdd
lemma arctan_ne_mul_pi_div_two {x : ℝ} : ∀ (k : ℤ), arctan x ≠ (2 * k + 1) * π / 2 := by
by_contra!
obtain ⟨k, h⟩ := this
obtain ⟨lb, ub⟩ := arctan_mem_Ioo x
rw [h, neg_eq_neg_one_mul, mul_div_assoc, mul_lt_mul_right (by positivity)] at lb
rw [h, ← one_mul (π / 2), mul_div_assoc, mul_lt_mul_right (by positivity)] at ub
norm_cast at lb ub; change -1 < _ at lb; omega
lemma arctan_add_arctan_lt_pi_div_two {x y : ℝ} (h : x * y < 1) : arctan x + arctan y < π / 2 := by
rcases le_or_lt y 0 with hy | hy
· rw [← add_zero (π / 2), ← arctan_zero]
exact add_lt_add_of_lt_of_le (arctan_lt_pi_div_two _) (tanOrderIso.symm.monotone hy)
· rw [← lt_div_iff₀ hy, ← inv_eq_one_div] at h
replace h : arctan x < arctan y⁻¹ := tanOrderIso.symm.strictMono h
rwa [arctan_inv_of_pos hy, lt_tsub_iff_right] at h
theorem arctan_add {x y : ℝ} (h : x * y < 1) :
arctan x + arctan y = arctan ((x + y) / (1 - x * y)) := by
rw [← arctan_tan (x := _ + _)]
· congr
conv_rhs => rw [← tan_arctan x, ← tan_arctan y]
exact tan_add' ⟨arctan_ne_mul_pi_div_two, arctan_ne_mul_pi_div_two⟩
· rw [neg_lt, neg_add, ← arctan_neg, ← arctan_neg]
rw [← neg_mul_neg] at h
exact arctan_add_arctan_lt_pi_div_two h
· exact arctan_add_arctan_lt_pi_div_two h
theorem arctan_add_eq_add_pi {x y : ℝ} (h : 1 < x * y) (hx : 0 < x) :
arctan x + arctan y = arctan ((x + y) / (1 - x * y)) + π := by
have hy : 0 < y := by
have := mul_pos_iff.mp (zero_lt_one.trans h)
simpa [hx, hx.asymm]
have k := arctan_add (mul_inv x y ▸ inv_lt_one_of_one_lt₀ h)
rw [arctan_inv_of_pos hx, arctan_inv_of_pos hy, show _ + _ = π - (arctan x + arctan y) by ring,
sub_eq_iff_eq_add, ← sub_eq_iff_eq_add', sub_eq_add_neg, ← arctan_neg, add_comm] at k
convert k.symm using 3
field_simp
rw [show -x + -y = -(x + y) by ring, show x * y - 1 = -(1 - x * y) by ring, neg_div_neg_eq]
theorem arctan_add_eq_sub_pi {x y : ℝ} (h : 1 < x * y) (hx : x < 0) :
arctan x + arctan y = arctan ((x + y) / (1 - x * y)) - π := by
rw [← neg_mul_neg] at h
have k := arctan_add_eq_add_pi h (neg_pos.mpr hx)
rw [show _ / _ = -((x + y) / (1 - x * y)) by ring, ← neg_inj] at k
simp only [arctan_neg, neg_add, neg_neg, ← sub_eq_add_neg _ π] at k
exact k
theorem two_mul_arctan {x : ℝ} (h₁ : -1 < x) (h₂ : x < 1) :
2 * arctan x = arctan (2 * x / (1 - x ^ 2)) := by
rw [two_mul, arctan_add (by nlinarith)]; congr 1; ring
theorem two_mul_arctan_add_pi {x : ℝ} (h : 1 < x) :
2 * arctan x = arctan (2 * x / (1 - x ^ 2)) + π := by
rw [two_mul, arctan_add_eq_add_pi (by nlinarith) (by linarith)]; congr 2; ring
theorem two_mul_arctan_sub_pi {x : ℝ} (h : x < -1) :
2 * arctan x = arctan (2 * x / (1 - x ^ 2)) - π := by
rw [two_mul, arctan_add_eq_sub_pi (by nlinarith) (by linarith)]; congr 2; ring
theorem arctan_inv_2_add_arctan_inv_3 : arctan 2⁻¹ + arctan 3⁻¹ = π / 4 := by
rw [arctan_add] <;> norm_num
theorem two_mul_arctan_inv_2_sub_arctan_inv_7 : 2 * arctan 2⁻¹ - arctan 7⁻¹ = π / 4 := by
rw [two_mul_arctan, ← arctan_one, sub_eq_iff_eq_add, arctan_add] <;> norm_num
theorem two_mul_arctan_inv_3_add_arctan_inv_7 : 2 * arctan 3⁻¹ + arctan 7⁻¹ = π / 4 := by
rw [two_mul_arctan, arctan_add] <;> norm_num
/-- **John Machin's 1706 formula**, which he used to compute π to 100 decimal places. -/
theorem four_mul_arctan_inv_5_sub_arctan_inv_239 : 4 * arctan 5⁻¹ - arctan 239⁻¹ = π / 4 := by
rw [show 4 * arctan _ = 2 * (2 * _) by ring, two_mul_arctan, two_mul_arctan, ← arctan_one,
sub_eq_iff_eq_add, arctan_add] <;> norm_num
end ArctanAdd
@[continuity]
| theorem continuous_arctan : Continuous arctan :=
continuous_subtype_val.comp tanOrderIso.toHomeomorph.continuous_invFun
| Mathlib/Analysis/SpecialFunctions/Trigonometric/Arctan.lean | 282 | 284 |
/-
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.Polynomial.Degree.Domain
import Mathlib.Algebra.Polynomial.Degree.Support
import Mathlib.Algebra.Polynomial.Eval.Coeff
import Mathlib.GroupTheory.GroupAction.Ring
/-!
# The derivative map on polynomials
## Main definitions
* `Polynomial.derivative`: The formal derivative of polynomials, expressed as a linear map.
* `Polynomial.derivativeFinsupp`: Iterated derivatives as a finite support function.
-/
noncomputable section
open Finset
open Polynomial
open scoped Nat
namespace Polynomial
universe u v w y z
variable {R : Type u} {S : Type v} {T : Type w} {ι : Type y} {A : Type z} {a b : R} {n : ℕ}
section Derivative
section Semiring
variable [Semiring R]
/-- `derivative p` is the formal derivative of the polynomial `p` -/
def derivative : R[X] →ₗ[R] R[X] where
toFun p := p.sum fun n a => C (a * n) * X ^ (n - 1)
map_add' p q := by
rw [sum_add_index] <;>
simp only [add_mul, forall_const, RingHom.map_add, eq_self_iff_true, zero_mul,
RingHom.map_zero]
map_smul' a p := by
dsimp; rw [sum_smul_index] <;>
simp only [mul_sum, ← C_mul', mul_assoc, coeff_C_mul, RingHom.map_mul, forall_const, zero_mul,
RingHom.map_zero, sum]
theorem derivative_apply (p : R[X]) : derivative p = p.sum fun n a => C (a * n) * X ^ (n - 1) :=
rfl
theorem coeff_derivative (p : R[X]) (n : ℕ) :
| coeff (derivative p) n = coeff p (n + 1) * (n + 1) := by
rw [derivative_apply]
simp only [coeff_X_pow, coeff_sum, coeff_C_mul]
rw [sum, Finset.sum_eq_single (n + 1)]
· simp only [Nat.add_succ_sub_one, add_zero, mul_one, if_true, eq_self_iff_true]; norm_cast
· intro b
cases b
· intros
rw [Nat.cast_zero, mul_zero, zero_mul]
· intro _ H
rw [Nat.add_one_sub_one, if_neg (mt (congr_arg Nat.succ) H.symm), mul_zero]
· rw [if_pos (add_tsub_cancel_right n 1).symm, mul_one, Nat.cast_add, Nat.cast_one,
mem_support_iff]
intro h
push_neg at h
simp [h]
| Mathlib/Algebra/Polynomial/Derivative.lean | 57 | 73 |
/-
Copyright (c) 2018 Johan Commelin. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johan Commelin
-/
import Mathlib.Algebra.BigOperators.Expect
import Mathlib.Algebra.Order.BigOperators.Ring.Finset
import Mathlib.Algebra.Order.Field.Canonical
import Mathlib.Algebra.Order.Nonneg.Floor
import Mathlib.Data.Real.Pointwise
import Mathlib.Data.NNReal.Defs
import Mathlib.Order.ConditionallyCompleteLattice.Group
/-!
# Basic results on nonnegative real numbers
This file contains all results on `NNReal` that do not directly follow from its basic structure.
As a consequence, it is a bit of a random collection of results, and is a good target for cleanup.
## Notations
This file uses `ℝ≥0` as a localized notation for `NNReal`.
-/
assert_not_exists Star
open Function
open scoped BigOperators
namespace NNReal
noncomputable instance : FloorSemiring ℝ≥0 := Nonneg.floorSemiring
@[simp, norm_cast]
theorem coe_indicator {α} (s : Set α) (f : α → ℝ≥0) (a : α) :
((s.indicator f a : ℝ≥0) : ℝ) = s.indicator (fun x => ↑(f x)) a :=
(toRealHom : ℝ≥0 →+ ℝ).map_indicator _ _ _
@[norm_cast]
theorem coe_list_sum (l : List ℝ≥0) : ((l.sum : ℝ≥0) : ℝ) = (l.map (↑)).sum :=
map_list_sum toRealHom l
@[norm_cast]
theorem coe_list_prod (l : List ℝ≥0) : ((l.prod : ℝ≥0) : ℝ) = (l.map (↑)).prod :=
map_list_prod toRealHom l
@[norm_cast]
theorem coe_multiset_sum (s : Multiset ℝ≥0) : ((s.sum : ℝ≥0) : ℝ) = (s.map (↑)).sum :=
map_multiset_sum toRealHom s
@[norm_cast]
theorem coe_multiset_prod (s : Multiset ℝ≥0) : ((s.prod : ℝ≥0) : ℝ) = (s.map (↑)).prod :=
map_multiset_prod toRealHom s
variable {ι : Type*} {s : Finset ι} {f : ι → ℝ}
@[simp, norm_cast]
theorem coe_sum (s : Finset ι) (f : ι → ℝ≥0) : ∑ i ∈ s, f i = ∑ i ∈ s, (f i : ℝ) :=
map_sum toRealHom _ _
@[simp, norm_cast]
lemma coe_expect (s : Finset ι) (f : ι → ℝ≥0) : 𝔼 i ∈ s, f i = 𝔼 i ∈ s, (f i : ℝ) :=
map_expect toRealHom ..
theorem _root_.Real.toNNReal_sum_of_nonneg (hf : ∀ i ∈ s, 0 ≤ f i) :
Real.toNNReal (∑ a ∈ s, f a) = ∑ a ∈ s, Real.toNNReal (f a) := by
rw [← coe_inj, NNReal.coe_sum, Real.coe_toNNReal _ (Finset.sum_nonneg hf)]
exact Finset.sum_congr rfl fun x hxs => by rw [Real.coe_toNNReal _ (hf x hxs)]
@[simp, norm_cast]
theorem coe_prod (s : Finset ι) (f : ι → ℝ≥0) : ↑(∏ a ∈ s, f a) = ∏ a ∈ s, (f a : ℝ) :=
map_prod toRealHom _ _
theorem _root_.Real.toNNReal_prod_of_nonneg (hf : ∀ a, a ∈ s → 0 ≤ f a) :
Real.toNNReal (∏ a ∈ s, f a) = ∏ a ∈ s, Real.toNNReal (f a) := by
rw [← coe_inj, NNReal.coe_prod, Real.coe_toNNReal _ (Finset.prod_nonneg hf)]
exact Finset.prod_congr rfl fun x hxs => by rw [Real.coe_toNNReal _ (hf x hxs)]
theorem le_iInf_add_iInf {ι ι' : Sort*} [Nonempty ι] [Nonempty ι'] {f : ι → ℝ≥0} {g : ι' → ℝ≥0}
{a : ℝ≥0} (h : ∀ i j, a ≤ f i + g j) : a ≤ (⨅ i, f i) + ⨅ j, g j := by
rw [← NNReal.coe_le_coe, NNReal.coe_add, coe_iInf, coe_iInf]
exact le_ciInf_add_ciInf h
theorem mul_finset_sup {α} (r : ℝ≥0) (s : Finset α) (f : α → ℝ≥0) :
r * s.sup f = s.sup fun a => r * f a :=
Finset.comp_sup_eq_sup_comp _ (NNReal.mul_sup r) (mul_zero r)
theorem finset_sup_mul {α} (s : Finset α) (f : α → ℝ≥0) (r : ℝ≥0) :
s.sup f * r = s.sup fun a => f a * r :=
Finset.comp_sup_eq_sup_comp (· * r) (fun x y => NNReal.sup_mul x y r) (zero_mul r)
theorem finset_sup_div {α} {f : α → ℝ≥0} {s : Finset α} (r : ℝ≥0) :
s.sup f / r = s.sup fun a => f a / r := by simp only [div_eq_inv_mul, mul_finset_sup]
open Real
section Sub
/-!
### Lemmas about subtraction
In this section we provide a few lemmas about subtraction that do not fit well into any other
typeclass. For lemmas about subtraction and addition see lemmas about `OrderedSub` in the file
`Mathlib.Algebra.Order.Sub.Basic`. See also `mul_tsub` and `tsub_mul`.
-/
theorem sub_div (a b c : ℝ≥0) : (a - b) / c = a / c - b / c :=
tsub_div _ _ _
end Sub
section Csupr
open Set
variable {ι : Sort*} {f : ι → ℝ≥0}
theorem iInf_mul (f : ι → ℝ≥0) (a : ℝ≥0) : iInf f * a = ⨅ i, f i * a := by
rw [← coe_inj, NNReal.coe_mul, coe_iInf, coe_iInf]
exact Real.iInf_mul_of_nonneg (NNReal.coe_nonneg _) _
theorem mul_iInf (f : ι → ℝ≥0) (a : ℝ≥0) : a * iInf f = ⨅ i, a * f i := by
simpa only [mul_comm] using iInf_mul f a
theorem mul_iSup (f : ι → ℝ≥0) (a : ℝ≥0) : (a * ⨆ i, f i) = ⨆ i, a * f i := by
rw [← coe_inj, NNReal.coe_mul, NNReal.coe_iSup, NNReal.coe_iSup]
exact Real.mul_iSup_of_nonneg (NNReal.coe_nonneg _) _
theorem iSup_mul (f : ι → ℝ≥0) (a : ℝ≥0) : (⨆ i, f i) * a = ⨆ i, f i * a := by
rw [mul_comm, mul_iSup]
simp_rw [mul_comm]
theorem iSup_div (f : ι → ℝ≥0) (a : ℝ≥0) : (⨆ i, f i) / a = ⨆ i, f i / a := by
simp only [div_eq_mul_inv, iSup_mul]
theorem mul_iSup_le {a : ℝ≥0} {g : ℝ≥0} {h : ι → ℝ≥0} (H : ∀ j, g * h j ≤ a) : g * iSup h ≤ a := by
rw [mul_iSup]
exact ciSup_le' H
theorem iSup_mul_le {a : ℝ≥0} {g : ι → ℝ≥0} {h : ℝ≥0} (H : ∀ i, g i * h ≤ a) : iSup g * h ≤ a := by
rw [iSup_mul]
exact ciSup_le' H
theorem iSup_mul_iSup_le {a : ℝ≥0} {g h : ι → ℝ≥0} (H : ∀ i j, g i * h j ≤ a) :
iSup g * iSup h ≤ a :=
iSup_mul_le fun _ => mul_iSup_le <| H _
variable [Nonempty ι]
theorem le_mul_iInf {a : ℝ≥0} {g : ℝ≥0} {h : ι → ℝ≥0} (H : ∀ j, a ≤ g * h j) : a ≤ g * iInf h := by
rw [mul_iInf]
exact le_ciInf H
theorem le_iInf_mul {a : ℝ≥0} {g : ι → ℝ≥0} {h : ℝ≥0} (H : ∀ i, a ≤ g i * h) : a ≤ iInf g * h := by
rw [iInf_mul]
exact le_ciInf H
theorem le_iInf_mul_iInf {a : ℝ≥0} {g h : ι → ℝ≥0} (H : ∀ i j, a ≤ g i * h j) :
a ≤ iInf g * iInf h :=
le_iInf_mul fun i => le_mul_iInf <| H i
end Csupr
end NNReal
| Mathlib/Data/NNReal/Basic.lean | 923 | 924 | |
/-
Copyright (c) 2018 Mario Carneiro. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Mario Carneiro
-/
import Mathlib.Computability.Tape
import Mathlib.Data.Fintype.Option
import Mathlib.Data.Fintype.Prod
import Mathlib.Data.Fintype.Pi
import Mathlib.Data.PFun
import Mathlib.Computability.PostTuringMachine
/-!
# Turing machines
The files `PostTuringMachine.lean` and `TuringMachine.lean` define
a sequence of simple machine languages, starting with Turing machines and working
up to more complex languages based on Wang B-machines.
`PostTuringMachine.lean` covers the TM0 model and TM1 model;
`TuringMachine.lean` adds the TM2 model.
## Naming conventions
Each model of computation in this file shares a naming convention for the elements of a model of
computation. These are the parameters for the language:
* `Γ` is the alphabet on the tape.
* `Λ` is the set of labels, or internal machine states.
* `σ` is the type of internal memory, not on the tape. This does not exist in the TM0 model, and
later models achieve this by mixing it into `Λ`.
* `K` is used in the TM2 model, which has multiple stacks, and denotes the number of such stacks.
All of these variables denote "essentially finite" types, but for technical reasons it is
convenient to allow them to be infinite anyway. When using an infinite type, we will be interested
to prove that only finitely many values of the type are ever interacted with.
Given these parameters, there are a few common structures for the model that arise:
* `Stmt` is the set of all actions that can be performed in one step. For the TM0 model this set is
finite, and for later models it is an infinite inductive type representing "possible program
texts".
* `Cfg` is the set of instantaneous configurations, that is, the state of the machine together with
its environment.
* `Machine` is the set of all machines in the model. Usually this is approximately a function
`Λ → Stmt`, although different models have different ways of halting and other actions.
* `step : Cfg → Option Cfg` is the function that describes how the state evolves over one step.
If `step c = none`, then `c` is a terminal state, and the result of the computation is read off
from `c`. Because of the type of `step`, these models are all deterministic by construction.
* `init : Input → Cfg` sets up the initial state. The type `Input` depends on the model;
in most cases it is `List Γ`.
* `eval : Machine → Input → Part Output`, given a machine `M` and input `i`, starts from
`init i`, runs `step` until it reaches an output, and then applies a function `Cfg → Output` to
the final state to obtain the result. The type `Output` depends on the model.
* `Supports : Machine → Finset Λ → Prop` asserts that a machine `M` starts in `S : Finset Λ`, and
can only ever jump to other states inside `S`. This implies that the behavior of `M` on any input
cannot depend on its values outside `S`. We use this to allow `Λ` to be an infinite set when
convenient, and prove that only finitely many of these states are actually accessible. This
formalizes "essentially finite" mentioned above.
-/
assert_not_exists MonoidWithZero
open List (Vector)
open Relation
open Nat (iterate)
open Function (update iterate_succ iterate_succ_apply iterate_succ' iterate_succ_apply'
iterate_zero_apply)
namespace Turing
/-!
## The TM2 model
The TM2 model removes the tape entirely from the TM1 model, replacing it with an arbitrary (finite)
collection of stacks, each with elements of different types (the alphabet of stack `k : K` is
`Γ k`). The statements are:
* `push k (f : σ → Γ k) q` puts `f a` on the `k`-th stack, then does `q`.
* `pop k (f : σ → Option (Γ k) → σ) q` changes the state to `f a (S k).head`, where `S k` is the
value of the `k`-th stack, and removes this element from the stack, then does `q`.
* `peek k (f : σ → Option (Γ k) → σ) q` changes the state to `f a (S k).head`, where `S k` is the
value of the `k`-th stack, then does `q`.
* `load (f : σ → σ) q` reads nothing but applies `f` to the internal state, then does `q`.
* `branch (f : σ → Bool) qtrue qfalse` does `qtrue` or `qfalse` according to `f a`.
* `goto (f : σ → Λ)` jumps to label `f a`.
* `halt` halts on the next step.
The configuration is a tuple `(l, var, stk)` where `l : Option Λ` is the current label to run or
`none` for the halting state, `var : σ` is the (finite) internal state, and `stk : ∀ k, List (Γ k)`
is the collection of stacks. (Note that unlike the `TM0` and `TM1` models, these are not
`ListBlank`s, they have definite ends that can be detected by the `pop` command.)
Given a designated stack `k` and a value `L : List (Γ k)`, the initial configuration has all the
stacks empty except the designated "input" stack; in `eval` this designated stack also functions
as the output stack.
-/
namespace TM2
variable {K : Type*}
-- Index type of stacks
variable (Γ : K → Type*)
-- Type of stack elements
variable (Λ : Type*)
-- Type of function labels
variable (σ : Type*)
-- Type of variable settings
/-- The TM2 model removes the tape entirely from the TM1 model,
replacing it with an arbitrary (finite) collection of stacks.
The operation `push` puts an element on one of the stacks,
and `pop` removes an element from a stack (and modifying the
internal state based on the result). `peek` modifies the
internal state but does not remove an element. -/
inductive Stmt
| push : ∀ k, (σ → Γ k) → Stmt → Stmt
| peek : ∀ k, (σ → Option (Γ k) → σ) → Stmt → Stmt
| pop : ∀ k, (σ → Option (Γ k) → σ) → Stmt → Stmt
| load : (σ → σ) → Stmt → Stmt
| branch : (σ → Bool) → Stmt → Stmt → Stmt
| goto : (σ → Λ) → Stmt
| halt : Stmt
open Stmt
instance Stmt.inhabited : Inhabited (Stmt Γ Λ σ) :=
⟨halt⟩
/-- A configuration in the TM2 model is a label (or `none` for the halt state), the state of
local variables, and the stacks. (Note that the stacks are not `ListBlank`s, they have a definite
size.) -/
structure Cfg where
/-- The current label to run (or `none` for the halting state) -/
l : Option Λ
/-- The internal state -/
var : σ
/-- The (finite) collection of internal stacks -/
stk : ∀ k, List (Γ k)
instance Cfg.inhabited [Inhabited σ] : Inhabited (Cfg Γ Λ σ) :=
⟨⟨default, default, default⟩⟩
variable {Γ Λ σ}
section
variable [DecidableEq K]
/-- The step function for the TM2 model. -/
def stepAux : Stmt Γ Λ σ → σ → (∀ k, List (Γ k)) → Cfg Γ Λ σ
| push k f q, v, S => stepAux q v (update S k (f v :: S k))
| peek k f q, v, S => stepAux q (f v (S k).head?) S
| pop k f q, v, S => stepAux q (f v (S k).head?) (update S k (S k).tail)
| load a q, v, S => stepAux q (a v) S
| branch f q₁ q₂, v, S => cond (f v) (stepAux q₁ v S) (stepAux q₂ v S)
| goto f, v, S => ⟨some (f v), v, S⟩
| halt, v, S => ⟨none, v, S⟩
/-- The step function for the TM2 model. -/
def step (M : Λ → Stmt Γ Λ σ) : Cfg Γ Λ σ → Option (Cfg Γ Λ σ)
| ⟨none, _, _⟩ => none
| ⟨some l, v, S⟩ => some (stepAux (M l) v S)
attribute [simp] stepAux.eq_1 stepAux.eq_2 stepAux.eq_3
stepAux.eq_4 stepAux.eq_5 stepAux.eq_6 stepAux.eq_7 step.eq_1 step.eq_2
/-- The (reflexive) reachability relation for the TM2 model. -/
def Reaches (M : Λ → Stmt Γ Λ σ) : Cfg Γ Λ σ → Cfg Γ Λ σ → Prop :=
ReflTransGen fun a b ↦ b ∈ step M a
end
/-- Given a set `S` of states, `SupportsStmt S q` means that `q` only jumps to states in `S`. -/
def SupportsStmt (S : Finset Λ) : Stmt Γ Λ σ → Prop
| push _ _ q => SupportsStmt S q
| peek _ _ q => SupportsStmt S q
| pop _ _ q => SupportsStmt S q
| load _ q => SupportsStmt S q
| branch _ q₁ q₂ => SupportsStmt S q₁ ∧ SupportsStmt S q₂
| goto l => ∀ v, l v ∈ S
| halt => True
section
open scoped Classical in
/-- The set of subtree statements in a statement. -/
noncomputable def stmts₁ : Stmt Γ Λ σ → Finset (Stmt Γ Λ σ)
| Q@(push _ _ q) => insert Q (stmts₁ q)
| Q@(peek _ _ q) => insert Q (stmts₁ q)
| Q@(pop _ _ q) => insert Q (stmts₁ q)
| Q@(load _ q) => insert Q (stmts₁ q)
| Q@(branch _ q₁ q₂) => insert Q (stmts₁ q₁ ∪ stmts₁ q₂)
| Q@(goto _) => {Q}
| Q@halt => {Q}
theorem stmts₁_self {q : Stmt Γ Λ σ} : q ∈ stmts₁ q := by
cases q <;> simp only [Finset.mem_insert_self, Finset.mem_singleton_self, stmts₁]
theorem stmts₁_trans {q₁ q₂ : Stmt Γ Λ σ} : q₁ ∈ stmts₁ q₂ → stmts₁ q₁ ⊆ stmts₁ q₂ := by
classical
intro h₁₂ q₀ h₀₁
induction q₂ with (
simp only [stmts₁] at h₁₂ ⊢
simp only [Finset.mem_insert, Finset.mem_singleton, Finset.mem_union] at h₁₂)
| branch f q₁ q₂ IH₁ IH₂ =>
rcases h₁₂ with (rfl | h₁₂ | h₁₂)
· unfold stmts₁ at h₀₁
exact h₀₁
· exact Finset.mem_insert_of_mem (Finset.mem_union_left _ (IH₁ h₁₂))
· exact Finset.mem_insert_of_mem (Finset.mem_union_right _ (IH₂ h₁₂))
| goto l => subst h₁₂; exact h₀₁
| halt => subst h₁₂; exact h₀₁
| load _ q IH | _ _ _ q IH =>
rcases h₁₂ with (rfl | h₁₂)
· unfold stmts₁ at h₀₁
exact h₀₁
· exact Finset.mem_insert_of_mem (IH h₁₂)
theorem stmts₁_supportsStmt_mono {S : Finset Λ} {q₁ q₂ : Stmt Γ Λ σ} (h : q₁ ∈ stmts₁ q₂)
(hs : SupportsStmt S q₂) : SupportsStmt S q₁ := by
induction q₂ with
simp only [stmts₁, SupportsStmt, Finset.mem_insert, Finset.mem_union, Finset.mem_singleton]
at h hs
| branch f q₁ q₂ IH₁ IH₂ => rcases h with (rfl | h | h); exacts [hs, IH₁ h hs.1, IH₂ h hs.2]
| goto l => subst h; exact hs
| halt => subst h; trivial
| load _ _ IH | _ _ _ _ IH => rcases h with (rfl | h) <;> [exact hs; exact IH h hs]
open scoped Classical in
/-- The set of statements accessible from initial set `S` of labels. -/
noncomputable def stmts (M : Λ → Stmt Γ Λ σ) (S : Finset Λ) : Finset (Option (Stmt Γ Λ σ)) :=
Finset.insertNone (S.biUnion fun q ↦ stmts₁ (M q))
theorem stmts_trans {M : Λ → Stmt Γ Λ σ} {S : Finset Λ} {q₁ q₂ : Stmt Γ Λ σ} (h₁ : q₁ ∈ stmts₁ q₂) :
some q₂ ∈ stmts M S → some q₁ ∈ stmts M S := by
simp only [stmts, Finset.mem_insertNone, Finset.mem_biUnion, Option.mem_def, Option.some.injEq,
forall_eq', exists_imp, and_imp]
exact fun l ls h₂ ↦ ⟨_, ls, stmts₁_trans h₂ h₁⟩
end
variable [Inhabited Λ]
/-- Given a TM2 machine `M` and a set `S` of states, `Supports M S` means that all states in
`S` jump only to other states in `S`. -/
def Supports (M : Λ → Stmt Γ Λ σ) (S : Finset Λ) :=
default ∈ S ∧ ∀ q ∈ S, SupportsStmt S (M q)
theorem stmts_supportsStmt {M : Λ → Stmt Γ Λ σ} {S : Finset Λ} {q : Stmt Γ Λ σ}
(ss : Supports M S) : some q ∈ stmts M S → SupportsStmt S q := by
simp only [stmts, Finset.mem_insertNone, Finset.mem_biUnion, Option.mem_def, Option.some.injEq,
forall_eq', exists_imp, and_imp]
exact fun l ls h ↦ stmts₁_supportsStmt_mono h (ss.2 _ ls)
variable [DecidableEq K]
theorem step_supports (M : Λ → Stmt Γ Λ σ) {S : Finset Λ} (ss : Supports M S) :
∀ {c c' : Cfg Γ Λ σ}, c' ∈ step M c → c.l ∈ Finset.insertNone S → c'.l ∈ Finset.insertNone S
| ⟨some l₁, v, T⟩, c', h₁, h₂ => by
replace h₂ := ss.2 _ (Finset.some_mem_insertNone.1 h₂)
simp only [step, Option.mem_def, Option.some.injEq] at h₁; subst c'
revert h₂; induction M l₁ generalizing v T with intro hs
| branch p q₁' q₂' IH₁ IH₂ =>
unfold stepAux; cases p v
· exact IH₂ _ _ hs.2
· exact IH₁ _ _ hs.1
| goto => exact Finset.some_mem_insertNone.2 (hs _)
| halt => apply Multiset.mem_cons_self
| load _ _ IH | _ _ _ _ IH => exact IH _ _ hs
variable [Inhabited σ]
/-- The initial state of the TM2 model. The input is provided on a designated stack. -/
def init (k : K) (L : List (Γ k)) : Cfg Γ Λ σ :=
⟨some default, default, update (fun _ ↦ []) k L⟩
/-- Evaluates a TM2 program to completion, with the output on the same stack as the input. -/
def eval (M : Λ → Stmt Γ Λ σ) (k : K) (L : List (Γ k)) : Part (List (Γ k)) :=
(Turing.eval (step M) (init k L)).map fun c ↦ c.stk k
end TM2
/-!
## TM2 emulator in TM1
To prove that TM2 computable functions are TM1 computable, we need to reduce each TM2 program to a
TM1 program. So suppose a TM2 program is given. This program has to maintain a whole collection of
stacks, but we have only one tape, so we must "multiplex" them all together. Pictorially, if stack
1 contains `[a, b]` and stack 2 contains `[c, d, e, f]` then the tape looks like this:
```
bottom: ... | _ | T | _ | _ | _ | _ | ...
stack 1: ... | _ | b | a | _ | _ | _ | ...
stack 2: ... | _ | f | e | d | c | _ | ...
```
where a tape element is a vertical slice through the diagram. Here the alphabet is
`Γ' := Bool × ∀ k, Option (Γ k)`, where:
* `bottom : Bool` is marked only in one place, the initial position of the TM, and represents the
tail of all stacks. It is never modified.
* `stk k : Option (Γ k)` is the value of the `k`-th stack, if in range, otherwise `none` (which is
the blank value). Note that the head of the stack is at the far end; this is so that push and pop
don't have to do any shifting.
In "resting" position, the TM is sitting at the position marked `bottom`. For non-stack actions,
it operates in place, but for the stack actions `push`, `peek`, and `pop`, it must shuttle to the
end of the appropriate stack, make its changes, and then return to the bottom. So the states are:
* `normal (l : Λ)`: waiting at `bottom` to execute function `l`
* `go k (s : StAct k) (q : Stmt₂)`: travelling to the right to get to the end of stack `k` in
order to perform stack action `s`, and later continue with executing `q`
* `ret (q : Stmt₂)`: travelling to the left after having performed a stack action, and executing
`q` once we arrive
Because of the shuttling, emulation overhead is `O(n)`, where `n` is the current maximum of the
length of all stacks. Therefore a program that takes `k` steps to run in TM2 takes `O((m+k)k)`
steps to run when emulated in TM1, where `m` is the length of the input.
-/
namespace TM2to1
-- A displaced lemma proved in unnecessary generality
theorem stk_nth_val {K : Type*} {Γ : K → Type*} {L : ListBlank (∀ k, Option (Γ k))} {k S} (n)
(hL : ListBlank.map (proj k) L = ListBlank.mk (List.map some S).reverse) :
L.nth n k = S.reverse[n]? := by
rw [← proj_map_nth, hL, ← List.map_reverse, ListBlank.nth_mk,
List.getI_eq_iget_getElem?, List.getElem?_map]
cases S.reverse[n]? <;> rfl
variable (K : Type*)
variable (Γ : K → Type*)
variable {Λ σ : Type*}
/-- The alphabet of the TM2 simulator on TM1 is a marker for the stack bottom,
plus a vector of stack elements for each stack, or none if the stack does not extend this far. -/
def Γ' :=
Bool × ∀ k, Option (Γ k)
variable {K Γ}
instance Γ'.inhabited : Inhabited (Γ' K Γ) :=
⟨⟨false, fun _ ↦ none⟩⟩
instance Γ'.fintype [DecidableEq K] [Fintype K] [∀ k, Fintype (Γ k)] : Fintype (Γ' K Γ) :=
instFintypeProd _ _
/-- The bottom marker is fixed throughout the calculation, so we use the `addBottom` function
to express the program state in terms of a tape with only the stacks themselves. -/
def addBottom (L : ListBlank (∀ k, Option (Γ k))) : ListBlank (Γ' K Γ) :=
ListBlank.cons (true, L.head) (L.tail.map ⟨Prod.mk false, rfl⟩)
theorem addBottom_map (L : ListBlank (∀ k, Option (Γ k))) :
(addBottom L).map ⟨Prod.snd, by rfl⟩ = L := by
simp only [addBottom, ListBlank.map_cons]
convert ListBlank.cons_head_tail L
generalize ListBlank.tail L = L'
refine L'.induction_on fun l ↦ ?_; simp
theorem addBottom_modifyNth (f : (∀ k, Option (Γ k)) → ∀ k, Option (Γ k))
(L : ListBlank (∀ k, Option (Γ k))) (n : ℕ) :
(addBottom L).modifyNth (fun a ↦ (a.1, f a.2)) n = addBottom (L.modifyNth f n) := by
cases n <;>
simp only [addBottom, ListBlank.head_cons, ListBlank.modifyNth, ListBlank.tail_cons]
congr; symm; apply ListBlank.map_modifyNth; intro; rfl
theorem addBottom_nth_snd (L : ListBlank (∀ k, Option (Γ k))) (n : ℕ) :
((addBottom L).nth n).2 = L.nth n := by
conv => rhs; rw [← addBottom_map L, ListBlank.nth_map]
theorem addBottom_nth_succ_fst (L : ListBlank (∀ k, Option (Γ k))) (n : ℕ) :
((addBottom L).nth (n + 1)).1 = false := by
rw [ListBlank.nth_succ, addBottom, ListBlank.tail_cons, ListBlank.nth_map]
theorem addBottom_head_fst (L : ListBlank (∀ k, Option (Γ k))) : (addBottom L).head.1 = true := by
| rw [addBottom, ListBlank.head_cons]
variable (K Γ σ) in
| Mathlib/Computability/TuringMachine.lean | 384 | 386 |
/-
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.Prime.Factorial
import Mathlib.NumberTheory.LegendreSymbol.Basic
import Mathlib.Analysis.Normed.Ring.Lemmas
/-!
# Lemmas of Gauss and Eisenstein
This file contains the Lemmas of Gauss and Eisenstein on the Legendre symbol.
The main results are `ZMod.gauss_lemma` and `ZMod.eisenstein_lemma`.
-/
open Finset Nat
open scoped Nat
section GaussEisenstein
namespace ZMod
/-- The image of the map sending a nonzero natural number `x ≤ p / 2` to the absolute value
of the integer in `(-p/2, p/2]` that is congruent to `a * x mod p` is the set
of nonzero natural numbers `x` such that `x ≤ p / 2`. -/
theorem Ico_map_valMinAbs_natAbs_eq_Ico_map_id (p : ℕ) [hp : Fact p.Prime] (a : ZMod p)
(hap : a ≠ 0) : ((Ico 1 (p / 2).succ).1.map fun (x : ℕ) => (a * x).valMinAbs.natAbs) =
(Ico 1 (p / 2).succ).1.map fun a => a := by
have he : ∀ {x}, x ∈ Ico 1 (p / 2).succ → x ≠ 0 ∧ x ≤ p / 2 := by
simp +contextual [Nat.lt_succ_iff, Nat.succ_le_iff, pos_iff_ne_zero]
have hep : ∀ {x}, x ∈ Ico 1 (p / 2).succ → x < p := fun hx =>
lt_of_le_of_lt (he hx).2 (Nat.div_lt_self hp.1.pos (by decide))
have hpe : ∀ {x}, x ∈ Ico 1 (p / 2).succ → ¬p ∣ x := fun hx hpx =>
not_lt_of_ge (le_of_dvd (Nat.pos_of_ne_zero (he hx).1) hpx) (hep hx)
have hmem : ∀ (x : ℕ) (_ : x ∈ Ico 1 (p / 2).succ),
(a * x : ZMod p).valMinAbs.natAbs ∈ Ico 1 (p / 2).succ := by
intro x hx
simp [hap, CharP.cast_eq_zero_iff (ZMod p) p, hpe hx, Nat.lt_succ_iff, succ_le_iff,
pos_iff_ne_zero, natAbs_valMinAbs_le _]
have hsurj : ∀ (b : ℕ) (hb : b ∈ Ico 1 (p / 2).succ),
∃ x, ∃ _ : x ∈ Ico 1 (p / 2).succ, (a * x : ZMod p).valMinAbs.natAbs = b := by
intro b hb
refine ⟨(b / a : ZMod p).valMinAbs.natAbs, mem_Ico.mpr ⟨?_, ?_⟩, ?_⟩
· apply Nat.pos_of_ne_zero
simp only [div_eq_mul_inv, hap, CharP.cast_eq_zero_iff (ZMod p) p, hpe hb, not_false_iff,
valMinAbs_eq_zero, inv_eq_zero, Int.natAbs_eq_zero, Ne, _root_.mul_eq_zero, or_self_iff]
· apply lt_succ_of_le; apply natAbs_valMinAbs_le
· rw [natCast_natAbs_valMinAbs]
split_ifs
· rw [mul_div_cancel₀ _ hap, valMinAbs_def_pos, val_cast_of_lt (hep hb),
if_pos (le_of_lt_succ (mem_Ico.1 hb).2), Int.natAbs_natCast]
· rw [mul_neg, mul_div_cancel₀ _ hap, natAbs_valMinAbs_neg, valMinAbs_def_pos,
val_cast_of_lt (hep hb), if_pos (le_of_lt_succ (mem_Ico.1 hb).2), Int.natAbs_natCast]
exact Multiset.map_eq_map_of_bij_of_nodup _ _ (Finset.nodup _) (Finset.nodup _)
(fun x _ => (a * x : ZMod p).valMinAbs.natAbs) hmem
(inj_on_of_surj_on_of_card_le _ hmem hsurj le_rfl) hsurj (fun _ _ => rfl)
private theorem gauss_lemma_aux₁ (p : ℕ) [Fact p.Prime] {a : ℤ} (hap : (a : ZMod p) ≠ 0) :
(a ^ (p / 2) * (p / 2)! : ZMod p) =
(-1 : ZMod p) ^ #{x ∈ Ico 1 (p / 2).succ | ¬ (a * x.cast : ZMod p).val ≤ p / 2} * (p / 2)! :=
calc
(a ^ (p / 2) * (p / 2)! : ZMod p) = ∏ x ∈ Ico 1 (p / 2).succ, a * x := by
rw [prod_mul_distrib, ← prod_natCast, prod_Ico_id_eq_factorial, prod_const, card_Ico,
Nat.add_one_sub_one]; simp
_ = ∏ x ∈ Ico 1 (p / 2).succ, ↑((a * x : ZMod p).val) := by simp
_ = ∏ x ∈ Ico 1 (p / 2).succ, (if (a * x : ZMod p).val ≤ p / 2 then (1 : ZMod p) else -1) *
(a * x : ZMod p).valMinAbs.natAbs :=
(prod_congr rfl fun _ _ => by
simp only [natCast_natAbs_valMinAbs]
split_ifs <;> simp)
_ = (-1 : ZMod p) ^ #{x ∈ Ico 1 (p / 2).succ | ¬(a * x.cast : ZMod p).val ≤ p / 2} *
∏ x ∈ Ico 1 (p / 2).succ, ↑((a * x : ZMod p).valMinAbs.natAbs) := by
have :
(∏ x ∈ Ico 1 (p / 2).succ, if (a * x : ZMod p).val ≤ p / 2 then (1 : ZMod p) else -1) =
∏ x ∈ Ico 1 (p / 2).succ with ¬(a * x.cast : ZMod p).val ≤ p / 2, -1 :=
prod_bij_ne_one (fun x _ _ => x)
(fun x => by split_ifs <;> (dsimp; simp_all))
(fun _ _ _ _ _ _ => id) (fun b h _ => ⟨b, by simp_all [-not_le]⟩)
(by intros; split_ifs at * <;> simp_all)
rw [prod_mul_distrib, this, prod_const]
_ = (-1 : ZMod p) ^ #{x ∈ Ico 1 (p / 2).succ | ¬(a * x.cast : ZMod p).val ≤ p / 2} *
(p / 2)! := by
rw [← prod_natCast, Finset.prod_eq_multiset_prod,
Ico_map_valMinAbs_natAbs_eq_Ico_map_id p a hap, ← Finset.prod_eq_multiset_prod,
prod_Ico_id_eq_factorial]
theorem gauss_lemma_aux (p : ℕ) [hp : Fact p.Prime] {a : ℤ} (hap : (a : ZMod p) ≠ 0) :
(a ^ (p / 2) : ZMod p) =
((-1) ^ #{x ∈ Ico 1 (p / 2).succ | p / 2 < (a * x.cast : ZMod p).val} :) :=
(mul_left_inj' (show ((p / 2)! : ZMod p) ≠ 0 by
rw [Ne, CharP.cast_eq_zero_iff (ZMod p) p, hp.1.dvd_factorial, not_le]
exact Nat.div_lt_self hp.1.pos (by decide))).1 <| by
simpa using gauss_lemma_aux₁ p hap
/-- **Gauss' lemma**. The Legendre symbol can be computed by considering the number of naturals less
than `p/2` such that `(a * x) % p > p / 2`. -/
theorem gauss_lemma {p : ℕ} [h : Fact p.Prime] {a : ℤ} (hp : p ≠ 2) (ha0 : (a : ZMod p) ≠ 0) :
legendreSym p a = (-1) ^ #{x ∈ Ico 1 (p / 2).succ | p / 2 < (a * x.cast : ZMod p).val} := by
replace hp : Odd p := h.out.odd_of_ne_two hp
have : (legendreSym p a : ZMod p) =
(((-1) ^ #{x ∈ Ico 1 (p / 2).succ | p / 2 < (a * x.cast : ZMod p).val} : ℤ) : ZMod p) := by
rw [legendreSym.eq_pow, gauss_lemma_aux p ha0]
cases legendreSym.eq_one_or_neg_one p ha0 <;>
cases neg_one_pow_eq_or ℤ #{x ∈ Ico 1 (p / 2).succ | p / 2 < (a * x.cast : ZMod p).val} <;>
simp_all [ne_neg_self hp one_ne_zero, (ne_neg_self hp one_ne_zero).symm]
private theorem eisenstein_lemma_aux₁ (p : ℕ) [Fact p.Prime] [hp2 : Fact (p % 2 = 1)] {a : ℕ}
(hap : (a : ZMod p) ≠ 0) :
((∑ x ∈ Ico 1 (p / 2).succ, a * x : ℕ) : ZMod 2) =
#{x ∈ Ico 1 (p / 2).succ | p / 2 < (a * x.cast : ZMod p).val} +
∑ x ∈ Ico 1 (p / 2).succ, x + (∑ x ∈ Ico 1 (p / 2).succ, a * x / p : ℕ) :=
have hp2 : (p : ZMod 2) = (1 : ℕ) := (eq_iff_modEq_nat _).2 hp2.1
calc
((∑ x ∈ Ico 1 (p / 2).succ, a * x : ℕ) : ZMod 2) =
((∑ x ∈ Ico 1 (p / 2).succ, (a * x % p + p * (a * x / p)) : ℕ) : ZMod 2) := by
simp only [mod_add_div]
_ = (∑ x ∈ Ico 1 (p / 2).succ, ((a * x : ℕ) : ZMod p).val : ℕ) +
(∑ x ∈ Ico 1 (p / 2).succ, a * x / p : ℕ) := by
simp only [val_natCast]
simp [sum_add_distrib, ← mul_sum, Nat.cast_add, Nat.cast_mul, Nat.cast_sum, hp2]
_ = _ :=
congr_arg₂ (· + ·)
(calc
((∑ x ∈ Ico 1 (p / 2).succ, ((a * x : ℕ) : ZMod p).val : ℕ) : ZMod 2) =
∑ x ∈ Ico 1 (p / 2).succ, (((a * x : ZMod p).valMinAbs +
if (a * x : ZMod p).val ≤ p / 2 then 0 else p : ℤ) : ZMod 2) := by
simp only [(val_eq_ite_valMinAbs _).symm]; simp [Nat.cast_sum]
_ = #{x ∈ Ico 1 (p / 2).succ | p / 2 < (a * x.cast : ZMod p).val} +
(∑ x ∈ Ico 1 (p / 2).succ, (a * x.cast : ZMod p).valMinAbs.natAbs : ℕ) := by
simp [add_comm, sum_add_distrib, Finset.sum_ite, hp2, Nat.cast_sum]
_ = _ := by
rw [Finset.sum_eq_multiset_sum, Ico_map_valMinAbs_natAbs_eq_Ico_map_id p a hap, ←
Finset.sum_eq_multiset_sum])
rfl
theorem eisenstein_lemma_aux (p : ℕ) [Fact p.Prime] [Fact (p % 2 = 1)] {a : ℕ} (ha2 : a % 2 = 1)
(hap : (a : ZMod p) ≠ 0) :
#{x ∈ Ico 1 (p / 2).succ | p / 2 < (a * x.cast : ZMod p).val} ≡
∑ x ∈ Ico 1 (p / 2).succ, x * a / p [MOD 2] :=
have ha2 : (a : ZMod 2) = (1 : ℕ) := (eq_iff_modEq_nat _).2 ha2
(eq_iff_modEq_nat 2).1 <| sub_eq_zero.1 <| by
simpa [add_left_comm, sub_eq_add_neg, ← mul_sum, mul_comm, ha2, Nat.cast_sum,
add_neg_eq_iff_eq_add.symm, add_assoc] using
Eq.symm (eisenstein_lemma_aux₁ p hap)
theorem div_eq_filter_card {a b c : ℕ} (hb0 : 0 < b) (hc : a / b ≤ c) :
a / b = #{x ∈ Ico 1 c.succ | x * b ≤ a} :=
calc
a / b = #(Ico 1 (a / b).succ) := by simp
_ = #{x ∈ Ico 1 c.succ | x * b ≤ a} :=
congr_arg _ <| Finset.ext fun x => by
have : x * b ≤ a → x ≤ c := fun h => le_trans (by rwa [le_div_iff_mul_le hb0]) hc
simp [Nat.lt_succ_iff, le_div_iff_mul_le hb0]; tauto
/-- The given sum is the number of integer points in the triangle formed by the diagonal of the
rectangle `(0, p/2) × (0, q/2)`. -/
private theorem sum_Ico_eq_card_lt {p q : ℕ} :
∑ a ∈ Ico 1 (p / 2).succ, a * q / p =
#{x ∈ Ico 1 (p / 2).succ ×ˢ Ico 1 (q / 2).succ | x.2 * p ≤ x.1 * q} :=
if hp0 : p = 0 then by simp [hp0, Finset.ext_iff]
else
calc
∑ a ∈ Ico 1 (p / 2).succ, a * q / p =
∑ a ∈ Ico 1 (p / 2).succ, #{x ∈ Ico 1 (q / 2).succ | x * p ≤ a * q} :=
Finset.sum_congr rfl fun x hx => div_eq_filter_card (Nat.pos_of_ne_zero hp0) <|
calc
x * q / p ≤ p / 2 * q / p := by have := le_of_lt_succ (mem_Ico.mp hx).2; gcongr
_ ≤ _ := Nat.div_mul_div_le_div _ _ _
_ = _ := by
rw [← card_sigma]
exact card_nbij' (fun a ↦ ⟨a.1, a.2⟩) (fun a ↦ ⟨a.1, a.2⟩)
(by simp +contextual only [mem_filter, mem_sigma, and_self_iff,
forall_true_iff, mem_product])
(by simp +contextual only [mem_filter, mem_sigma, and_self_iff,
forall_true_iff, mem_product]) (fun _ _ ↦ rfl) (fun _ _ ↦ rfl)
/-- Each of the sums in this lemma is the cardinality of the set of integer points in each of the
two triangles formed by the diagonal of the rectangle `(0, p/2) × (0, q/2)`. Adding them
gives the number of points in the rectangle. -/
theorem sum_mul_div_add_sum_mul_div_eq_mul (p q : ℕ) [hp : Fact p.Prime] (hq0 : (q : ZMod p) ≠ 0) :
∑ a ∈ Ico 1 (p / 2).succ, a * q / p + ∑ a ∈ Ico 1 (q / 2).succ, a * p / q =
p / 2 * (q / 2) := by
have hswap :
#{x ∈ Ico 1 (q / 2).succ ×ˢ Ico 1 (p / 2).succ | x.2 * q ≤ x.1 * p} =
#{x ∈ Ico 1 (p / 2).succ ×ˢ Ico 1 (q / 2).succ | x.1 * q ≤ x.2 * p} :=
card_equiv (Equiv.prodComm _ _)
(fun ⟨_, _⟩ => by
simp +contextual only [mem_filter, and_self_iff, Prod.swap_prod_mk,
forall_true_iff, mem_product, Equiv.prodComm_apply, and_assoc, and_left_comm])
| have hdisj :
Disjoint {x ∈ Ico 1 (p / 2).succ ×ˢ Ico 1 (q / 2).succ | x.2 * p ≤ x.1 * q}
{x ∈ Ico 1 (p / 2).succ ×ˢ Ico 1 (q / 2).succ | x.1 * q ≤ x.2 * p} := by
apply disjoint_filter.2 fun x hx hpq hqp => ?_
have hxp : x.1 < p := lt_of_le_of_lt
(show x.1 ≤ p / 2 by simp_all only [Nat.lt_succ_iff, mem_Ico, mem_product])
(Nat.div_lt_self hp.1.pos (by decide))
have : (x.1 : ZMod p) = 0 := by
simpa [hq0] using congr_arg ((↑) : ℕ → ZMod p) (le_antisymm hpq hqp)
apply_fun ZMod.val at this
rw [val_cast_of_lt hxp, val_zero] at this
simp only [this, nonpos_iff_eq_zero, mem_Ico, one_ne_zero, false_and, mem_product] at hx
have hunion :
{x ∈ Ico 1 (p / 2).succ ×ˢ Ico 1 (q / 2).succ | x.2 * p ≤ x.1 * q} ∪
{x ∈ Ico 1 (p / 2).succ ×ˢ Ico 1 (q / 2).succ | x.1 * q ≤ x.2 * p} =
Ico 1 (p / 2).succ ×ˢ Ico 1 (q / 2).succ :=
Finset.ext fun x => by
have := le_total (x.2 * p) (x.1 * q)
simp only [mem_union, mem_filter, mem_Ico, mem_product]
tauto
rw [sum_Ico_eq_card_lt, sum_Ico_eq_card_lt, hswap, ← card_union_of_disjoint hdisj, hunion,
card_product]
simp only [card_Ico, tsub_zero, succ_sub_succ_eq_sub]
/-- **Eisenstein's lemma** -/
theorem eisenstein_lemma {p : ℕ} [Fact p.Prime] (hp : p ≠ 2) {a : ℕ} (ha1 : a % 2 = 1)
(ha0 : (a : ZMod p) ≠ 0) : legendreSym p a = (-1) ^ ∑ x ∈ Ico 1 (p / 2).succ, x * a / p := by
haveI hp' : Fact (p % 2 = 1) := ⟨Nat.Prime.mod_two_eq_one_iff_ne_two.mpr hp⟩
have ha0' : ((a : ℤ) : ZMod p) ≠ 0 := by norm_cast
rw [neg_one_pow_eq_pow_mod_two, gauss_lemma hp ha0', neg_one_pow_eq_pow_mod_two,
(by norm_cast : ((a : ℤ) : ZMod p) = (a : ZMod p)),
show _ = _ from eisenstein_lemma_aux p ha1 ha0]
end ZMod
| Mathlib/NumberTheory/LegendreSymbol/GaussEisensteinLemmas.lean | 193 | 226 |
/-
Copyright (c) 2020 Yury Kudryashov, Anne Baanen. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Yury Kudryashov, Anne Baanen
-/
import Mathlib.Algebra.BigOperators.Ring.Finset
import Mathlib.Algebra.Group.Action.Pi
import Mathlib.Data.Fintype.BigOperators
import Mathlib.Data.Fintype.Fin
import Mathlib.Logic.Equiv.Fin.Basic
/-!
# Big operators and `Fin`
Some results about products and sums over the type `Fin`.
The most important results are the induction formulas `Fin.prod_univ_castSucc`
and `Fin.prod_univ_succ`, and the formula `Fin.prod_const` for the product of a
constant function. These results have variants for sums instead of products.
## Main declarations
* `finFunctionFinEquiv`: An explicit equivalence between `Fin n → Fin m` and `Fin (m ^ n)`.
-/
assert_not_exists Field
open Finset
variable {α M : Type*}
namespace Finset
@[to_additive]
theorem prod_range [CommMonoid M] {n : ℕ} (f : ℕ → M) :
∏ i ∈ Finset.range n, f i = ∏ i : Fin n, f i :=
(Fin.prod_univ_eq_prod_range _ _).symm
end Finset
namespace Fin
section CommMonoid
variable [CommMonoid M] {n : ℕ}
@[to_additive]
theorem prod_ofFn (f : Fin n → M) : (List.ofFn f).prod = ∏ i, f i := by
simp [prod_eq_multiset_prod]
@[to_additive]
theorem prod_univ_def (f : Fin n → M) : ∏ i, f i = ((List.finRange n).map f).prod := by
rw [← List.ofFn_eq_map, prod_ofFn]
/-- A product of a function `f : Fin 0 → M` is `1` because `Fin 0` is empty -/
@[to_additive "A sum of a function `f : Fin 0 → M` is `0` because `Fin 0` is empty"]
theorem prod_univ_zero (f : Fin 0 → M) : ∏ i, f i = 1 :=
rfl
/-- A product of a function `f : Fin (n + 1) → M` over all `Fin (n + 1)`
is the product of `f x`, for some `x : Fin (n + 1)` times the remaining product -/
@[to_additive "A sum of a function `f : Fin (n + 1) → M` over all `Fin (n + 1)` is the sum of
`f x`, for some `x : Fin (n + 1)` plus the remaining sum"]
theorem prod_univ_succAbove (f : Fin (n + 1) → M) (x : Fin (n + 1)) :
∏ i, f i = f x * ∏ i : Fin n, f (x.succAbove i) := by
rw [univ_succAbove n x, prod_cons, Finset.prod_map, coe_succAboveEmb]
/-- A product of a function `f : Fin (n + 1) → M` over all `Fin (n + 1)`
| is the product of `f 0` plus the remaining product -/
@[to_additive "A sum of a function `f : Fin (n + 1) → M` over all `Fin (n + 1)` is the sum of
`f 0` plus the remaining sum"]
theorem prod_univ_succ (f : Fin (n + 1) → M) :
| Mathlib/Algebra/BigOperators/Fin.lean | 69 | 72 |
/-
Copyright (c) 2020 Floris van Doorn. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Floris van Doorn
-/
import Mathlib.Data.Set.Prod
/-!
# N-ary images of sets
This file defines `Set.image2`, the binary image of sets.
This is mostly useful to define pointwise operations and `Set.seq`.
## Notes
This file is very similar to `Data.Finset.NAry`, to `Order.Filter.NAry`, and to
`Data.Option.NAry`. Please keep them in sync.
-/
open Function
namespace Set
variable {α α' β β' γ γ' δ δ' ε ε' ζ ζ' ν : Type*} {f f' : α → β → γ}
variable {s s' : Set α} {t t' : Set β} {u : Set γ} {v : Set δ} {a : α} {b : β}
theorem mem_image2_iff (hf : Injective2 f) : f a b ∈ image2 f s t ↔ a ∈ s ∧ b ∈ t :=
⟨by
rintro ⟨a', ha', b', hb', h⟩
rcases hf h with ⟨rfl, rfl⟩
exact ⟨ha', hb'⟩, fun ⟨ha, hb⟩ => mem_image2_of_mem ha hb⟩
/-- image2 is monotone with respect to `⊆`. -/
@[gcongr]
theorem image2_subset (hs : s ⊆ s') (ht : t ⊆ t') : image2 f s t ⊆ image2 f s' t' := by
rintro _ ⟨a, ha, b, hb, rfl⟩
exact mem_image2_of_mem (hs ha) (ht hb)
@[gcongr]
theorem image2_subset_left (ht : t ⊆ t') : image2 f s t ⊆ image2 f s t' :=
image2_subset Subset.rfl ht
@[gcongr]
theorem image2_subset_right (hs : s ⊆ s') : image2 f s t ⊆ image2 f s' t :=
image2_subset hs Subset.rfl
theorem image_subset_image2_left (hb : b ∈ t) : (fun a => f a b) '' s ⊆ image2 f s t :=
forall_mem_image.2 fun _ ha => mem_image2_of_mem ha hb
theorem image_subset_image2_right (ha : a ∈ s) : f a '' t ⊆ image2 f s t :=
forall_mem_image.2 fun _ => mem_image2_of_mem ha
lemma forall_mem_image2 {p : γ → Prop} :
(∀ z ∈ image2 f s t, p z) ↔ ∀ x ∈ s, ∀ y ∈ t, p (f x y) := by aesop
lemma exists_mem_image2 {p : γ → Prop} :
(∃ z ∈ image2 f s t, p z) ↔ ∃ x ∈ s, ∃ y ∈ t, p (f x y) := by aesop
@[deprecated (since := "2024-11-23")] alias forall_image2_iff := forall_mem_image2
@[simp]
theorem image2_subset_iff {u : Set γ} : image2 f s t ⊆ u ↔ ∀ x ∈ s, ∀ y ∈ t, f x y ∈ u :=
forall_mem_image2
theorem image2_subset_iff_left : image2 f s t ⊆ u ↔ ∀ a ∈ s, (fun b => f a b) '' t ⊆ u := by
simp_rw [image2_subset_iff, image_subset_iff, subset_def, mem_preimage]
theorem image2_subset_iff_right : image2 f s t ⊆ u ↔ ∀ b ∈ t, (fun a => f a b) '' s ⊆ u := by
simp_rw [image2_subset_iff, image_subset_iff, subset_def, mem_preimage, @forall₂_swap α]
variable (f)
@[simp]
lemma image_prod : (fun x : α × β ↦ f x.1 x.2) '' s ×ˢ t = image2 f s t :=
ext fun _ ↦ by simp [and_assoc]
@[simp] lemma image_uncurry_prod (s : Set α) (t : Set β) : uncurry f '' s ×ˢ t = image2 f s t :=
image_prod _
@[simp] lemma image2_mk_eq_prod : image2 Prod.mk s t = s ×ˢ t := ext <| by simp
@[simp]
lemma image2_curry (f : α × β → γ) (s : Set α) (t : Set β) :
image2 (fun a b ↦ f (a, b)) s t = f '' s ×ˢ t := by
simp [← image_uncurry_prod, uncurry]
theorem image2_swap (s : Set α) (t : Set β) : image2 f s t = image2 (fun a b => f b a) t s := by
ext
constructor <;> rintro ⟨a, ha, b, hb, rfl⟩ <;> exact ⟨b, hb, a, ha, rfl⟩
variable {f}
theorem image2_union_left : image2 f (s ∪ s') t = image2 f s t ∪ image2 f s' t := by
simp_rw [← image_prod, union_prod, image_union]
theorem image2_union_right : image2 f s (t ∪ t') = image2 f s t ∪ image2 f s t' := by
rw [← image2_swap, image2_union_left, image2_swap f, image2_swap f]
lemma image2_inter_left (hf : Injective2 f) :
image2 f (s ∩ s') t = image2 f s t ∩ image2 f s' t := by
simp_rw [← image_uncurry_prod, inter_prod, image_inter hf.uncurry]
lemma image2_inter_right (hf : Injective2 f) :
image2 f s (t ∩ t') = image2 f s t ∩ image2 f s t' := by
simp_rw [← image_uncurry_prod, prod_inter, image_inter hf.uncurry]
@[simp]
theorem image2_empty_left : image2 f ∅ t = ∅ :=
ext <| by simp
@[simp]
theorem image2_empty_right : image2 f s ∅ = ∅ :=
ext <| by simp
theorem Nonempty.image2 : s.Nonempty → t.Nonempty → (image2 f s t).Nonempty :=
fun ⟨_, ha⟩ ⟨_, hb⟩ => ⟨_, mem_image2_of_mem ha hb⟩
@[simp]
theorem image2_nonempty_iff : (image2 f s t).Nonempty ↔ s.Nonempty ∧ t.Nonempty :=
⟨fun ⟨_, a, ha, b, hb, _⟩ => ⟨⟨a, ha⟩, b, hb⟩, fun h => h.1.image2 h.2⟩
theorem Nonempty.of_image2_left (h : (Set.image2 f s t).Nonempty) : s.Nonempty :=
(image2_nonempty_iff.1 h).1
theorem Nonempty.of_image2_right (h : (Set.image2 f s t).Nonempty) : t.Nonempty :=
(image2_nonempty_iff.1 h).2
@[simp]
theorem image2_eq_empty_iff : image2 f s t = ∅ ↔ s = ∅ ∨ t = ∅ := by
rw [← not_nonempty_iff_eq_empty, image2_nonempty_iff, not_and_or]
simp [not_nonempty_iff_eq_empty]
theorem Subsingleton.image2 (hs : s.Subsingleton) (ht : t.Subsingleton) (f : α → β → γ) :
(image2 f s t).Subsingleton := by
rw [← image_prod]
apply (hs.prod ht).image
theorem image2_inter_subset_left : image2 f (s ∩ s') t ⊆ image2 f s t ∩ image2 f s' t :=
Monotone.map_inf_le (fun _ _ ↦ image2_subset_right) s s'
theorem image2_inter_subset_right : image2 f s (t ∩ t') ⊆ image2 f s t ∩ image2 f s t' :=
Monotone.map_inf_le (fun _ _ ↦ image2_subset_left) t t'
@[simp]
theorem image2_singleton_left : image2 f {a} t = f a '' t :=
ext fun x => by simp
@[simp]
theorem image2_singleton_right : image2 f s {b} = (fun a => f a b) '' s :=
ext fun x => by simp
theorem image2_singleton : image2 f {a} {b} = {f a b} := by simp
@[simp]
theorem image2_insert_left : image2 f (insert a s) t = (fun b => f a b) '' t ∪ image2 f s t := by
rw [insert_eq, image2_union_left, image2_singleton_left]
@[simp]
theorem image2_insert_right : image2 f s (insert b t) = (fun a => f a b) '' s ∪ image2 f s t := by
rw [insert_eq, image2_union_right, image2_singleton_right]
@[congr]
theorem image2_congr (h : ∀ a ∈ s, ∀ b ∈ t, f a b = f' a b) : image2 f s t = image2 f' s t := by
ext
constructor <;> rintro ⟨a, ha, b, hb, rfl⟩ <;> exact ⟨a, ha, b, hb, by rw [h a ha b hb]⟩
/-- A common special case of `image2_congr` -/
theorem image2_congr' (h : ∀ a b, f a b = f' a b) : image2 f s t = image2 f' s t :=
image2_congr fun a _ b _ => h a b
theorem image_image2 (f : α → β → γ) (g : γ → δ) :
g '' image2 f s t = image2 (fun a b => g (f a b)) s t := by
simp only [← image_prod, image_image]
|
theorem image2_image_left (f : γ → β → δ) (g : α → γ) :
| Mathlib/Data/Set/NAry.lean | 173 | 174 |
/-
Copyright (c) 2019 Zhouhang Zhou. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Zhouhang Zhou, Sébastien Gouëzel, Frédéric Dupuis
-/
import Mathlib.Algebra.BigOperators.Field
import Mathlib.Analysis.Complex.Basic
import Mathlib.Analysis.InnerProductSpace.Defs
import Mathlib.GroupTheory.MonoidLocalization.Basic
/-!
# Properties of inner product spaces
This file proves many basic properties of inner product spaces (real or complex).
## Main results
- `inner_mul_inner_self_le`: the Cauchy-Schwartz inequality (one of many variants).
- `norm_inner_eq_norm_iff`: the equality criteion in the Cauchy-Schwartz inequality (also in many
variants).
- `inner_eq_sum_norm_sq_div_four`: the polarization identity.
## Tags
inner product space, Hilbert space, norm
-/
noncomputable section
open RCLike Real Filter Topology ComplexConjugate Finsupp
open LinearMap (BilinForm)
variable {𝕜 E F : Type*} [RCLike 𝕜]
section BasicProperties_Seminormed
open scoped InnerProductSpace
variable [SeminormedAddCommGroup E] [InnerProductSpace 𝕜 E]
variable [SeminormedAddCommGroup F] [InnerProductSpace ℝ F]
local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y
local postfix:90 "†" => starRingEnd _
export InnerProductSpace (norm_sq_eq_re_inner)
@[simp]
theorem inner_conj_symm (x y : E) : ⟪y, x⟫† = ⟪x, y⟫ :=
InnerProductSpace.conj_inner_symm _ _
theorem real_inner_comm (x y : F) : ⟪y, x⟫_ℝ = ⟪x, y⟫_ℝ :=
@inner_conj_symm ℝ _ _ _ _ x y
theorem inner_eq_zero_symm {x y : E} : ⟪x, y⟫ = 0 ↔ ⟪y, x⟫ = 0 := by
rw [← inner_conj_symm]
exact star_eq_zero
@[simp]
theorem inner_self_im (x : E) : im ⟪x, x⟫ = 0 := by rw [← @ofReal_inj 𝕜, im_eq_conj_sub]; simp
theorem inner_add_left (x y z : E) : ⟪x + y, z⟫ = ⟪x, z⟫ + ⟪y, z⟫ :=
InnerProductSpace.add_left _ _ _
theorem inner_add_right (x y z : E) : ⟪x, y + z⟫ = ⟪x, y⟫ + ⟪x, z⟫ := by
rw [← inner_conj_symm, inner_add_left, RingHom.map_add]
simp only [inner_conj_symm]
theorem inner_re_symm (x y : E) : re ⟪x, y⟫ = re ⟪y, x⟫ := by rw [← inner_conj_symm, conj_re]
theorem inner_im_symm (x y : E) : im ⟪x, y⟫ = -im ⟪y, x⟫ := by rw [← inner_conj_symm, conj_im]
section Algebra
variable {𝕝 : Type*} [CommSemiring 𝕝] [StarRing 𝕝] [Algebra 𝕝 𝕜] [Module 𝕝 E]
[IsScalarTower 𝕝 𝕜 E] [StarModule 𝕝 𝕜]
/-- See `inner_smul_left` for the common special when `𝕜 = 𝕝`. -/
lemma inner_smul_left_eq_star_smul (x y : E) (r : 𝕝) : ⟪r • x, y⟫ = r† • ⟪x, y⟫ := by
rw [← algebraMap_smul 𝕜 r, InnerProductSpace.smul_left, starRingEnd_apply, starRingEnd_apply,
← algebraMap_star_comm, ← smul_eq_mul, algebraMap_smul]
/-- Special case of `inner_smul_left_eq_star_smul` when the acting ring has a trivial star
(eg `ℕ`, `ℤ`, `ℚ≥0`, `ℚ`, `ℝ`). -/
lemma inner_smul_left_eq_smul [TrivialStar 𝕝] (x y : E) (r : 𝕝) : ⟪r • x, y⟫ = r • ⟪x, y⟫ := by
rw [inner_smul_left_eq_star_smul, starRingEnd_apply, star_trivial]
/-- See `inner_smul_right` for the common special when `𝕜 = 𝕝`. -/
lemma inner_smul_right_eq_smul (x y : E) (r : 𝕝) : ⟪x, r • y⟫ = r • ⟪x, y⟫ := by
rw [← inner_conj_symm, inner_smul_left_eq_star_smul, starRingEnd_apply, starRingEnd_apply,
star_smul, star_star, ← starRingEnd_apply, inner_conj_symm]
end Algebra
/-- See `inner_smul_left_eq_star_smul` for the case of a general algebra action. -/
theorem inner_smul_left (x y : E) (r : 𝕜) : ⟪r • x, y⟫ = r† * ⟪x, y⟫ :=
inner_smul_left_eq_star_smul ..
theorem real_inner_smul_left (x y : F) (r : ℝ) : ⟪r • x, y⟫_ℝ = r * ⟪x, y⟫_ℝ :=
inner_smul_left _ _ _
theorem inner_smul_real_left (x y : E) (r : ℝ) : ⟪(r : 𝕜) • x, y⟫ = r • ⟪x, y⟫ := by
rw [inner_smul_left, conj_ofReal, Algebra.smul_def]
/-- See `inner_smul_right_eq_smul` for the case of a general algebra action. -/
theorem inner_smul_right (x y : E) (r : 𝕜) : ⟪x, r • y⟫ = r * ⟪x, y⟫ :=
inner_smul_right_eq_smul ..
theorem real_inner_smul_right (x y : F) (r : ℝ) : ⟪x, r • y⟫_ℝ = r * ⟪x, y⟫_ℝ :=
inner_smul_right _ _ _
theorem inner_smul_real_right (x y : E) (r : ℝ) : ⟪x, (r : 𝕜) • y⟫ = r • ⟪x, y⟫ := by
rw [inner_smul_right, Algebra.smul_def]
/-- The inner product as a sesquilinear form.
Note that in the case `𝕜 = ℝ` this is a bilinear form. -/
@[simps!]
def sesqFormOfInner : E →ₗ[𝕜] E →ₗ⋆[𝕜] 𝕜 :=
LinearMap.mk₂'ₛₗ (RingHom.id 𝕜) (starRingEnd _) (fun x y => ⟪y, x⟫)
(fun _x _y _z => inner_add_right _ _ _) (fun _r _x _y => inner_smul_right _ _ _)
(fun _x _y _z => inner_add_left _ _ _) fun _r _x _y => inner_smul_left _ _ _
/-- The real inner product as a bilinear form.
Note that unlike `sesqFormOfInner`, this does not reverse the order of the arguments. -/
@[simps!]
def bilinFormOfRealInner : BilinForm ℝ F := sesqFormOfInner.flip
/-- An inner product with a sum on the left. -/
theorem sum_inner {ι : Type*} (s : Finset ι) (f : ι → E) (x : E) :
⟪∑ i ∈ s, f i, x⟫ = ∑ i ∈ s, ⟪f i, x⟫ :=
map_sum (sesqFormOfInner (𝕜 := 𝕜) (E := E) x) _ _
/-- An inner product with a sum on the right. -/
theorem inner_sum {ι : Type*} (s : Finset ι) (f : ι → E) (x : E) :
⟪x, ∑ i ∈ s, f i⟫ = ∑ i ∈ s, ⟪x, f i⟫ :=
map_sum (LinearMap.flip sesqFormOfInner x) _ _
/-- An inner product with a sum on the left, `Finsupp` version. -/
protected theorem Finsupp.sum_inner {ι : Type*} (l : ι →₀ 𝕜) (v : ι → E) (x : E) :
⟪l.sum fun (i : ι) (a : 𝕜) => a • v i, x⟫ = l.sum fun (i : ι) (a : 𝕜) => conj a • ⟪v i, x⟫ := by
convert sum_inner (𝕜 := 𝕜) l.support (fun a => l a • v a) x
simp only [inner_smul_left, Finsupp.sum, smul_eq_mul]
/-- An inner product with a sum on the right, `Finsupp` version. -/
protected theorem Finsupp.inner_sum {ι : Type*} (l : ι →₀ 𝕜) (v : ι → E) (x : E) :
⟪x, l.sum fun (i : ι) (a : 𝕜) => a • v i⟫ = l.sum fun (i : ι) (a : 𝕜) => a • ⟪x, v i⟫ := by
convert inner_sum (𝕜 := 𝕜) l.support (fun a => l a • v a) x
simp only [inner_smul_right, Finsupp.sum, smul_eq_mul]
protected theorem DFinsupp.sum_inner {ι : Type*} [DecidableEq ι] {α : ι → Type*}
[∀ i, AddZeroClass (α i)] [∀ (i) (x : α i), Decidable (x ≠ 0)] (f : ∀ i, α i → E)
(l : Π₀ i, α i) (x : E) : ⟪l.sum f, x⟫ = l.sum fun i a => ⟪f i a, x⟫ := by
simp +contextual only [DFinsupp.sum, sum_inner, smul_eq_mul]
protected theorem DFinsupp.inner_sum {ι : Type*} [DecidableEq ι] {α : ι → Type*}
[∀ i, AddZeroClass (α i)] [∀ (i) (x : α i), Decidable (x ≠ 0)] (f : ∀ i, α i → E)
(l : Π₀ i, α i) (x : E) : ⟪x, l.sum f⟫ = l.sum fun i a => ⟪x, f i a⟫ := by
simp +contextual only [DFinsupp.sum, inner_sum, smul_eq_mul]
@[simp]
theorem inner_zero_left (x : E) : ⟪0, x⟫ = 0 := by
rw [← zero_smul 𝕜 (0 : E), inner_smul_left, RingHom.map_zero, zero_mul]
theorem inner_re_zero_left (x : E) : re ⟪0, x⟫ = 0 := by
simp only [inner_zero_left, AddMonoidHom.map_zero]
@[simp]
theorem inner_zero_right (x : E) : ⟪x, 0⟫ = 0 := by
rw [← inner_conj_symm, inner_zero_left, RingHom.map_zero]
theorem inner_re_zero_right (x : E) : re ⟪x, 0⟫ = 0 := by
simp only [inner_zero_right, AddMonoidHom.map_zero]
theorem inner_self_nonneg {x : E} : 0 ≤ re ⟪x, x⟫ :=
PreInnerProductSpace.toCore.re_inner_nonneg x
theorem real_inner_self_nonneg {x : F} : 0 ≤ ⟪x, x⟫_ℝ :=
@inner_self_nonneg ℝ F _ _ _ x
@[simp]
theorem inner_self_ofReal_re (x : E) : (re ⟪x, x⟫ : 𝕜) = ⟪x, x⟫ :=
((RCLike.is_real_TFAE (⟪x, x⟫ : 𝕜)).out 2 3).2 (inner_self_im (𝕜 := 𝕜) x)
theorem inner_self_eq_norm_sq_to_K (x : E) : ⟪x, x⟫ = (‖x‖ : 𝕜) ^ 2 := by
rw [← inner_self_ofReal_re, ← norm_sq_eq_re_inner, ofReal_pow]
theorem inner_self_re_eq_norm (x : E) : re ⟪x, x⟫ = ‖⟪x, x⟫‖ := by
conv_rhs => rw [← inner_self_ofReal_re]
symm
exact norm_of_nonneg inner_self_nonneg
theorem inner_self_ofReal_norm (x : E) : (‖⟪x, x⟫‖ : 𝕜) = ⟪x, x⟫ := by
rw [← inner_self_re_eq_norm]
exact inner_self_ofReal_re _
theorem real_inner_self_abs (x : F) : |⟪x, x⟫_ℝ| = ⟪x, x⟫_ℝ :=
@inner_self_ofReal_norm ℝ F _ _ _ x
theorem norm_inner_symm (x y : E) : ‖⟪x, y⟫‖ = ‖⟪y, x⟫‖ := by rw [← inner_conj_symm, norm_conj]
@[simp]
theorem inner_neg_left (x y : E) : ⟪-x, y⟫ = -⟪x, y⟫ := by
rw [← neg_one_smul 𝕜 x, inner_smul_left]
simp
@[simp]
theorem inner_neg_right (x y : E) : ⟪x, -y⟫ = -⟪x, y⟫ := by
rw [← inner_conj_symm, inner_neg_left]; simp only [RingHom.map_neg, inner_conj_symm]
theorem inner_neg_neg (x y : E) : ⟪-x, -y⟫ = ⟪x, y⟫ := by simp
theorem inner_self_conj (x : E) : ⟪x, x⟫† = ⟪x, x⟫ := inner_conj_symm _ _
theorem inner_sub_left (x y z : E) : ⟪x - y, z⟫ = ⟪x, z⟫ - ⟪y, z⟫ := by
simp [sub_eq_add_neg, inner_add_left]
theorem inner_sub_right (x y z : E) : ⟪x, y - z⟫ = ⟪x, y⟫ - ⟪x, z⟫ := by
simp [sub_eq_add_neg, inner_add_right]
theorem inner_mul_symm_re_eq_norm (x y : E) : re (⟪x, y⟫ * ⟪y, x⟫) = ‖⟪x, y⟫ * ⟪y, x⟫‖ := by
rw [← inner_conj_symm, mul_comm]
exact re_eq_norm_of_mul_conj (inner y x)
/-- Expand `⟪x + y, x + y⟫` -/
theorem inner_add_add_self (x y : E) : ⟪x + y, x + y⟫ = ⟪x, x⟫ + ⟪x, y⟫ + ⟪y, x⟫ + ⟪y, y⟫ := by
simp only [inner_add_left, inner_add_right]; ring
/-- Expand `⟪x + y, x + y⟫_ℝ` -/
theorem real_inner_add_add_self (x y : F) :
⟪x + y, x + y⟫_ℝ = ⟪x, x⟫_ℝ + 2 * ⟪x, y⟫_ℝ + ⟪y, y⟫_ℝ := by
have : ⟪y, x⟫_ℝ = ⟪x, y⟫_ℝ := by rw [← inner_conj_symm]; rfl
simp only [inner_add_add_self, this, add_left_inj]
ring
-- Expand `⟪x - y, x - y⟫`
theorem inner_sub_sub_self (x y : E) : ⟪x - y, x - y⟫ = ⟪x, x⟫ - ⟪x, y⟫ - ⟪y, x⟫ + ⟪y, y⟫ := by
simp only [inner_sub_left, inner_sub_right]; ring
/-- Expand `⟪x - y, x - y⟫_ℝ` -/
theorem real_inner_sub_sub_self (x y : F) :
⟪x - y, x - y⟫_ℝ = ⟪x, x⟫_ℝ - 2 * ⟪x, y⟫_ℝ + ⟪y, y⟫_ℝ := by
have : ⟪y, x⟫_ℝ = ⟪x, y⟫_ℝ := by rw [← inner_conj_symm]; rfl
simp only [inner_sub_sub_self, this, add_left_inj]
ring
/-- Parallelogram law -/
theorem parallelogram_law {x y : E} : ⟪x + y, x + y⟫ + ⟪x - y, x - y⟫ = 2 * (⟪x, x⟫ + ⟪y, y⟫) := by
simp only [inner_add_add_self, inner_sub_sub_self]
ring
/-- **Cauchy–Schwarz inequality**. -/
theorem inner_mul_inner_self_le (x y : E) : ‖⟪x, y⟫‖ * ‖⟪y, x⟫‖ ≤ re ⟪x, x⟫ * re ⟪y, y⟫ :=
letI cd : PreInnerProductSpace.Core 𝕜 E := PreInnerProductSpace.toCore
InnerProductSpace.Core.inner_mul_inner_self_le x y
/-- Cauchy–Schwarz inequality for real inner products. -/
theorem real_inner_mul_inner_self_le (x y : F) : ⟪x, y⟫_ℝ * ⟪x, y⟫_ℝ ≤ ⟪x, x⟫_ℝ * ⟪y, y⟫_ℝ :=
calc
⟪x, y⟫_ℝ * ⟪x, y⟫_ℝ ≤ ‖⟪x, y⟫_ℝ‖ * ‖⟪y, x⟫_ℝ‖ := by
rw [real_inner_comm y, ← norm_mul]
exact le_abs_self _
_ ≤ ⟪x, x⟫_ℝ * ⟪y, y⟫_ℝ := @inner_mul_inner_self_le ℝ _ _ _ _ x y
end BasicProperties_Seminormed
section BasicProperties
variable [NormedAddCommGroup E] [InnerProductSpace 𝕜 E]
variable [NormedAddCommGroup F] [InnerProductSpace ℝ F]
local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y
export InnerProductSpace (norm_sq_eq_re_inner)
@[simp]
theorem inner_self_eq_zero {x : E} : ⟪x, x⟫ = 0 ↔ x = 0 := by
rw [inner_self_eq_norm_sq_to_K, sq_eq_zero_iff, ofReal_eq_zero, norm_eq_zero]
theorem inner_self_ne_zero {x : E} : ⟪x, x⟫ ≠ 0 ↔ x ≠ 0 :=
inner_self_eq_zero.not
variable (𝕜)
theorem ext_inner_left {x y : E} (h : ∀ v, ⟪v, x⟫ = ⟪v, y⟫) : x = y := by
rw [← sub_eq_zero, ← @inner_self_eq_zero 𝕜, inner_sub_right, sub_eq_zero, h (x - y)]
theorem ext_inner_right {x y : E} (h : ∀ v, ⟪x, v⟫ = ⟪y, v⟫) : x = y := by
rw [← sub_eq_zero, ← @inner_self_eq_zero 𝕜, inner_sub_left, sub_eq_zero, h (x - y)]
variable {𝕜}
@[simp]
theorem re_inner_self_nonpos {x : E} : re ⟪x, x⟫ ≤ 0 ↔ x = 0 := by
rw [← norm_sq_eq_re_inner, (sq_nonneg _).le_iff_eq, sq_eq_zero_iff, norm_eq_zero]
@[simp]
lemma re_inner_self_pos {x : E} : 0 < re ⟪x, x⟫ ↔ x ≠ 0 := by
simpa [-re_inner_self_nonpos] using re_inner_self_nonpos (𝕜 := 𝕜) (x := x).not
@[deprecated (since := "2025-04-22")] alias inner_self_nonpos := re_inner_self_nonpos
@[deprecated (since := "2025-04-22")] alias inner_self_pos := re_inner_self_pos
open scoped InnerProductSpace in
theorem real_inner_self_nonpos {x : F} : ⟪x, x⟫_ℝ ≤ 0 ↔ x = 0 := re_inner_self_nonpos (𝕜 := ℝ)
open scoped InnerProductSpace in
theorem real_inner_self_pos {x : F} : 0 < ⟪x, x⟫_ℝ ↔ x ≠ 0 := re_inner_self_pos (𝕜 := ℝ)
/-- A family of vectors is linearly independent if they are nonzero
and orthogonal. -/
theorem linearIndependent_of_ne_zero_of_inner_eq_zero {ι : Type*} {v : ι → E} (hz : ∀ i, v i ≠ 0)
(ho : Pairwise fun i j => ⟪v i, v j⟫ = 0) : LinearIndependent 𝕜 v := by
rw [linearIndependent_iff']
intro s g hg i hi
have h' : g i * inner (v i) (v i) = inner (v i) (∑ j ∈ s, g j • v j) := by
rw [inner_sum]
symm
convert Finset.sum_eq_single (M := 𝕜) i ?_ ?_
· rw [inner_smul_right]
· intro j _hj hji
rw [inner_smul_right, ho hji.symm, mul_zero]
· exact fun h => False.elim (h hi)
simpa [hg, hz] using h'
end BasicProperties
section Norm_Seminormed
open scoped InnerProductSpace
variable [SeminormedAddCommGroup E] [InnerProductSpace 𝕜 E]
variable [SeminormedAddCommGroup F] [InnerProductSpace ℝ F]
local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y
local notation "IK" => @RCLike.I 𝕜 _
theorem norm_eq_sqrt_re_inner (x : E) : ‖x‖ = √(re ⟪x, x⟫) :=
calc
‖x‖ = √(‖x‖ ^ 2) := (sqrt_sq (norm_nonneg _)).symm
_ = √(re ⟪x, x⟫) := congr_arg _ (norm_sq_eq_re_inner _)
@[deprecated (since := "2025-04-22")] alias norm_eq_sqrt_inner := norm_eq_sqrt_re_inner
theorem norm_eq_sqrt_real_inner (x : F) : ‖x‖ = √⟪x, x⟫_ℝ :=
@norm_eq_sqrt_re_inner ℝ _ _ _ _ x
theorem inner_self_eq_norm_mul_norm (x : E) : re ⟪x, x⟫ = ‖x‖ * ‖x‖ := by
rw [@norm_eq_sqrt_re_inner 𝕜, ← sqrt_mul inner_self_nonneg (re ⟪x, x⟫),
sqrt_mul_self inner_self_nonneg]
theorem inner_self_eq_norm_sq (x : E) : re ⟪x, x⟫ = ‖x‖ ^ 2 := by
rw [pow_two, inner_self_eq_norm_mul_norm]
theorem real_inner_self_eq_norm_mul_norm (x : F) : ⟪x, x⟫_ℝ = ‖x‖ * ‖x‖ := by
have h := @inner_self_eq_norm_mul_norm ℝ F _ _ _ x
simpa using h
theorem real_inner_self_eq_norm_sq (x : F) : ⟪x, x⟫_ℝ = ‖x‖ ^ 2 := by
rw [pow_two, real_inner_self_eq_norm_mul_norm]
/-- Expand the square -/
theorem norm_add_sq (x y : E) : ‖x + y‖ ^ 2 = ‖x‖ ^ 2 + 2 * re ⟪x, y⟫ + ‖y‖ ^ 2 := by
repeat' rw [sq (M := ℝ), ← @inner_self_eq_norm_mul_norm 𝕜]
rw [inner_add_add_self, two_mul]
simp only [add_assoc, add_left_inj, add_right_inj, AddMonoidHom.map_add]
rw [← inner_conj_symm, conj_re]
alias norm_add_pow_two := norm_add_sq
/-- Expand the square -/
theorem norm_add_sq_real (x y : F) : ‖x + y‖ ^ 2 = ‖x‖ ^ 2 + 2 * ⟪x, y⟫_ℝ + ‖y‖ ^ 2 := by
have h := @norm_add_sq ℝ _ _ _ _ x y
simpa using h
alias norm_add_pow_two_real := norm_add_sq_real
/-- Expand the square -/
theorem norm_add_mul_self (x y : E) :
‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + 2 * re ⟪x, y⟫ + ‖y‖ * ‖y‖ := by
repeat' rw [← sq (M := ℝ)]
exact norm_add_sq _ _
/-- Expand the square -/
theorem norm_add_mul_self_real (x y : F) :
‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + 2 * ⟪x, y⟫_ℝ + ‖y‖ * ‖y‖ := by
have h := @norm_add_mul_self ℝ _ _ _ _ x y
simpa using h
/-- Expand the square -/
theorem norm_sub_sq (x y : E) : ‖x - y‖ ^ 2 = ‖x‖ ^ 2 - 2 * re ⟪x, y⟫ + ‖y‖ ^ 2 := by
rw [sub_eq_add_neg, @norm_add_sq 𝕜 _ _ _ _ x (-y), norm_neg, inner_neg_right, map_neg, mul_neg,
sub_eq_add_neg]
alias norm_sub_pow_two := norm_sub_sq
/-- Expand the square -/
theorem norm_sub_sq_real (x y : F) : ‖x - y‖ ^ 2 = ‖x‖ ^ 2 - 2 * ⟪x, y⟫_ℝ + ‖y‖ ^ 2 :=
@norm_sub_sq ℝ _ _ _ _ _ _
alias norm_sub_pow_two_real := norm_sub_sq_real
/-- Expand the square -/
theorem norm_sub_mul_self (x y : E) :
‖x - y‖ * ‖x - y‖ = ‖x‖ * ‖x‖ - 2 * re ⟪x, y⟫ + ‖y‖ * ‖y‖ := by
repeat' rw [← sq (M := ℝ)]
exact norm_sub_sq _ _
/-- Expand the square -/
theorem norm_sub_mul_self_real (x y : F) :
‖x - y‖ * ‖x - y‖ = ‖x‖ * ‖x‖ - 2 * ⟪x, y⟫_ℝ + ‖y‖ * ‖y‖ := by
have h := @norm_sub_mul_self ℝ _ _ _ _ x y
simpa using h
/-- Cauchy–Schwarz inequality with norm -/
theorem norm_inner_le_norm (x y : E) : ‖⟪x, y⟫‖ ≤ ‖x‖ * ‖y‖ := by
rw [norm_eq_sqrt_re_inner (𝕜 := 𝕜) x, norm_eq_sqrt_re_inner (𝕜 := 𝕜) y]
letI : PreInnerProductSpace.Core 𝕜 E := PreInnerProductSpace.toCore
exact InnerProductSpace.Core.norm_inner_le_norm x y
theorem nnnorm_inner_le_nnnorm (x y : E) : ‖⟪x, y⟫‖₊ ≤ ‖x‖₊ * ‖y‖₊ :=
norm_inner_le_norm x y
theorem re_inner_le_norm (x y : E) : re ⟪x, y⟫ ≤ ‖x‖ * ‖y‖ :=
le_trans (re_le_norm (inner x y)) (norm_inner_le_norm x y)
/-- Cauchy–Schwarz inequality with norm -/
theorem abs_real_inner_le_norm (x y : F) : |⟪x, y⟫_ℝ| ≤ ‖x‖ * ‖y‖ :=
(Real.norm_eq_abs _).ge.trans (norm_inner_le_norm x y)
/-- Cauchy–Schwarz inequality with norm -/
theorem real_inner_le_norm (x y : F) : ⟪x, y⟫_ℝ ≤ ‖x‖ * ‖y‖ :=
le_trans (le_abs_self _) (abs_real_inner_le_norm _ _)
lemma inner_eq_zero_of_left {x : E} (y : E) (h : ‖x‖ = 0) : ⟪x, y⟫_𝕜 = 0 := by
rw [← norm_eq_zero]
refine le_antisymm ?_ (by positivity)
exact norm_inner_le_norm _ _ |>.trans <| by simp [h]
lemma inner_eq_zero_of_right (x : E) {y : E} (h : ‖y‖ = 0) : ⟪x, y⟫_𝕜 = 0 := by
rw [inner_eq_zero_symm, inner_eq_zero_of_left _ h]
variable (𝕜)
include 𝕜 in
theorem parallelogram_law_with_norm (x y : E) :
‖x + y‖ * ‖x + y‖ + ‖x - y‖ * ‖x - y‖ = 2 * (‖x‖ * ‖x‖ + ‖y‖ * ‖y‖) := by
simp only [← @inner_self_eq_norm_mul_norm 𝕜]
rw [← re.map_add, parallelogram_law, two_mul, two_mul]
simp only [re.map_add]
include 𝕜 in
theorem parallelogram_law_with_nnnorm (x y : E) :
‖x + y‖₊ * ‖x + y‖₊ + ‖x - y‖₊ * ‖x - y‖₊ = 2 * (‖x‖₊ * ‖x‖₊ + ‖y‖₊ * ‖y‖₊) :=
Subtype.ext <| parallelogram_law_with_norm 𝕜 x y
variable {𝕜}
/-- Polarization identity: The real part of the inner product, in terms of the norm. -/
theorem re_inner_eq_norm_add_mul_self_sub_norm_mul_self_sub_norm_mul_self_div_two (x y : E) :
re ⟪x, y⟫ = (‖x + y‖ * ‖x + y‖ - ‖x‖ * ‖x‖ - ‖y‖ * ‖y‖) / 2 := by
rw [@norm_add_mul_self 𝕜]
ring
/-- Polarization identity: The real part of the inner product, in terms of the norm. -/
theorem re_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two (x y : E) :
re ⟪x, y⟫ = (‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ - ‖x - y‖ * ‖x - y‖) / 2 := by
rw [@norm_sub_mul_self 𝕜]
ring
/-- Polarization identity: The real part of the inner product, in terms of the norm. -/
theorem re_inner_eq_norm_add_mul_self_sub_norm_sub_mul_self_div_four (x y : E) :
re ⟪x, y⟫ = (‖x + y‖ * ‖x + y‖ - ‖x - y‖ * ‖x - y‖) / 4 := by
rw [@norm_add_mul_self 𝕜, @norm_sub_mul_self 𝕜]
ring
/-- Polarization identity: The imaginary part of the inner product, in terms of the norm. -/
theorem im_inner_eq_norm_sub_i_smul_mul_self_sub_norm_add_i_smul_mul_self_div_four (x y : E) :
im ⟪x, y⟫ = (‖x - IK • y‖ * ‖x - IK • y‖ - ‖x + IK • y‖ * ‖x + IK • y‖) / 4 := by
simp only [@norm_add_mul_self 𝕜, @norm_sub_mul_self 𝕜, inner_smul_right, I_mul_re]
ring
/-- Polarization identity: The inner product, in terms of the norm. -/
theorem inner_eq_sum_norm_sq_div_four (x y : E) :
⟪x, y⟫ = ((‖x + y‖ : 𝕜) ^ 2 - (‖x - y‖ : 𝕜) ^ 2 +
((‖x - IK • y‖ : 𝕜) ^ 2 - (‖x + IK • y‖ : 𝕜) ^ 2) * IK) / 4 := by
rw [← re_add_im ⟪x, y⟫, re_inner_eq_norm_add_mul_self_sub_norm_sub_mul_self_div_four,
im_inner_eq_norm_sub_i_smul_mul_self_sub_norm_add_i_smul_mul_self_div_four]
push_cast
simp only [sq, ← mul_div_right_comm, ← add_div]
/-- Polarization identity: The real inner product, in terms of the norm. -/
theorem real_inner_eq_norm_add_mul_self_sub_norm_mul_self_sub_norm_mul_self_div_two (x y : F) :
⟪x, y⟫_ℝ = (‖x + y‖ * ‖x + y‖ - ‖x‖ * ‖x‖ - ‖y‖ * ‖y‖) / 2 :=
re_to_real.symm.trans <|
re_inner_eq_norm_add_mul_self_sub_norm_mul_self_sub_norm_mul_self_div_two x y
/-- Polarization identity: The real inner product, in terms of the norm. -/
theorem real_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two (x y : F) :
⟪x, y⟫_ℝ = (‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ - ‖x - y‖ * ‖x - y‖) / 2 :=
re_to_real.symm.trans <|
re_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two x y
/-- Pythagorean theorem, if-and-only-if vector inner product form. -/
theorem norm_add_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero (x y : F) :
‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ ↔ ⟪x, y⟫_ℝ = 0 := by
rw [@norm_add_mul_self ℝ, add_right_cancel_iff, add_eq_left, mul_eq_zero]
norm_num
/-- Pythagorean theorem, if-and-if vector inner product form using square roots. -/
theorem norm_add_eq_sqrt_iff_real_inner_eq_zero {x y : F} :
‖x + y‖ = √(‖x‖ * ‖x‖ + ‖y‖ * ‖y‖) ↔ ⟪x, y⟫_ℝ = 0 := by
rw [← norm_add_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero, eq_comm, sqrt_eq_iff_mul_self_eq,
eq_comm] <;> positivity
/-- Pythagorean theorem, vector inner product form. -/
theorem norm_add_sq_eq_norm_sq_add_norm_sq_of_inner_eq_zero (x y : E) (h : ⟪x, y⟫ = 0) :
‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ := by
rw [@norm_add_mul_self 𝕜, add_right_cancel_iff, add_eq_left, mul_eq_zero]
apply Or.inr
simp only [h, zero_re']
/-- Pythagorean theorem, vector inner product form. -/
theorem norm_add_sq_eq_norm_sq_add_norm_sq_real {x y : F} (h : ⟪x, y⟫_ℝ = 0) :
‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ :=
(norm_add_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero x y).2 h
/-- Pythagorean theorem, subtracting vectors, if-and-only-if vector
inner product form. -/
theorem norm_sub_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero (x y : F) :
‖x - y‖ * ‖x - y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ ↔ ⟪x, y⟫_ℝ = 0 := by
rw [@norm_sub_mul_self ℝ, add_right_cancel_iff, sub_eq_add_neg, add_eq_left, neg_eq_zero,
mul_eq_zero]
norm_num
/-- Pythagorean theorem, subtracting vectors, if-and-if vector inner product form using square
roots. -/
theorem norm_sub_eq_sqrt_iff_real_inner_eq_zero {x y : F} :
‖x - y‖ = √(‖x‖ * ‖x‖ + ‖y‖ * ‖y‖) ↔ ⟪x, y⟫_ℝ = 0 := by
rw [← norm_sub_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero, eq_comm, sqrt_eq_iff_mul_self_eq,
eq_comm] <;> positivity
/-- Pythagorean theorem, subtracting vectors, vector inner product
form. -/
theorem norm_sub_sq_eq_norm_sq_add_norm_sq_real {x y : F} (h : ⟪x, y⟫_ℝ = 0) :
‖x - y‖ * ‖x - y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ :=
(norm_sub_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero x y).2 h
/-- The sum and difference of two vectors are orthogonal if and only
if they have the same norm. -/
theorem real_inner_add_sub_eq_zero_iff (x y : F) : ⟪x + y, x - y⟫_ℝ = 0 ↔ ‖x‖ = ‖y‖ := by
conv_rhs => rw [← mul_self_inj_of_nonneg (norm_nonneg _) (norm_nonneg _)]
simp only [← @inner_self_eq_norm_mul_norm ℝ, inner_add_left, inner_sub_right, real_inner_comm y x,
sub_eq_zero, re_to_real]
constructor
· intro h
rw [add_comm] at h
linarith
· intro h
linarith
/-- Given two orthogonal vectors, their sum and difference have equal norms. -/
theorem norm_sub_eq_norm_add {v w : E} (h : ⟪v, w⟫ = 0) : ‖w - v‖ = ‖w + v‖ := by
rw [← mul_self_inj_of_nonneg (norm_nonneg _) (norm_nonneg _)]
simp only [h, ← @inner_self_eq_norm_mul_norm 𝕜, sub_neg_eq_add, sub_zero, map_sub, zero_re',
zero_sub, add_zero, map_add, inner_add_right, inner_sub_left, inner_sub_right, inner_re_symm,
zero_add]
/-- The real inner product of two vectors, divided by the product of their
norms, has absolute value at most 1. -/
theorem abs_real_inner_div_norm_mul_norm_le_one (x y : F) : |⟪x, y⟫_ℝ / (‖x‖ * ‖y‖)| ≤ 1 := by
rw [abs_div, abs_mul, abs_norm, abs_norm]
exact div_le_one_of_le₀ (abs_real_inner_le_norm x y) (by positivity)
/-- The inner product of a vector with a multiple of itself. -/
theorem real_inner_smul_self_left (x : F) (r : ℝ) : ⟪r • x, x⟫_ℝ = r * (‖x‖ * ‖x‖) := by
rw [real_inner_smul_left, ← real_inner_self_eq_norm_mul_norm]
/-- The inner product of a vector with a multiple of itself. -/
theorem real_inner_smul_self_right (x : F) (r : ℝ) : ⟪x, r • x⟫_ℝ = r * (‖x‖ * ‖x‖) := by
rw [inner_smul_right, ← real_inner_self_eq_norm_mul_norm]
/-- The inner product of two weighted sums, where the weights in each
sum add to 0, in terms of the norms of pairwise differences. -/
theorem inner_sum_smul_sum_smul_of_sum_eq_zero {ι₁ : Type*} {s₁ : Finset ι₁} {w₁ : ι₁ → ℝ}
(v₁ : ι₁ → F) (h₁ : ∑ i ∈ s₁, w₁ i = 0) {ι₂ : Type*} {s₂ : Finset ι₂} {w₂ : ι₂ → ℝ}
(v₂ : ι₂ → F) (h₂ : ∑ i ∈ s₂, w₂ i = 0) :
⟪∑ i₁ ∈ s₁, w₁ i₁ • v₁ i₁, ∑ i₂ ∈ s₂, w₂ i₂ • v₂ i₂⟫_ℝ =
(-∑ i₁ ∈ s₁, ∑ i₂ ∈ s₂, w₁ i₁ * w₂ i₂ * (‖v₁ i₁ - v₂ i₂‖ * ‖v₁ i₁ - v₂ i₂‖)) / 2 := by
simp_rw [sum_inner, inner_sum, real_inner_smul_left, real_inner_smul_right,
real_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two, ← div_sub_div_same,
← div_add_div_same, mul_sub_left_distrib, left_distrib, Finset.sum_sub_distrib,
Finset.sum_add_distrib, ← Finset.mul_sum, ← Finset.sum_mul, h₁, h₂, zero_mul,
mul_zero, Finset.sum_const_zero, zero_add, zero_sub, Finset.mul_sum, neg_div,
Finset.sum_div, mul_div_assoc, mul_assoc]
end Norm_Seminormed
section Norm
open scoped InnerProductSpace
variable [NormedAddCommGroup E] [InnerProductSpace 𝕜 E]
variable [NormedAddCommGroup F] [InnerProductSpace ℝ F]
variable {ι : Type*}
local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y
/-- Formula for the distance between the images of two nonzero points under an inversion with center
zero. See also `EuclideanGeometry.dist_inversion_inversion` for inversions around a general
point. -/
theorem dist_div_norm_sq_smul {x y : F} (hx : x ≠ 0) (hy : y ≠ 0) (R : ℝ) :
dist ((R / ‖x‖) ^ 2 • x) ((R / ‖y‖) ^ 2 • y) = R ^ 2 / (‖x‖ * ‖y‖) * dist x y :=
calc
dist ((R / ‖x‖) ^ 2 • x) ((R / ‖y‖) ^ 2 • y) =
√(‖(R / ‖x‖) ^ 2 • x - (R / ‖y‖) ^ 2 • y‖ ^ 2) := by
rw [dist_eq_norm, sqrt_sq (norm_nonneg _)]
_ = √((R ^ 2 / (‖x‖ * ‖y‖)) ^ 2 * ‖x - y‖ ^ 2) :=
congr_arg sqrt <| by
field_simp [sq, norm_sub_mul_self_real, norm_smul, real_inner_smul_left, inner_smul_right,
Real.norm_of_nonneg (mul_self_nonneg _)]
ring
_ = R ^ 2 / (‖x‖ * ‖y‖) * dist x y := by
rw [sqrt_mul, sqrt_sq, sqrt_sq, dist_eq_norm] <;> positivity
/-- The inner product of a nonzero vector with a nonzero multiple of
itself, divided by the product of their norms, has absolute value
1. -/
theorem norm_inner_div_norm_mul_norm_eq_one_of_ne_zero_of_ne_zero_mul {x : E} {r : 𝕜} (hx : x ≠ 0)
(hr : r ≠ 0) : ‖⟪x, r • x⟫‖ / (‖x‖ * ‖r • x‖) = 1 := by
have hx' : ‖x‖ ≠ 0 := by simp [hx]
have hr' : ‖r‖ ≠ 0 := by simp [hr]
rw [inner_smul_right, norm_mul, ← inner_self_re_eq_norm, inner_self_eq_norm_mul_norm, norm_smul]
rw [← mul_assoc, ← div_div, mul_div_cancel_right₀ _ hx', ← div_div, mul_comm,
mul_div_cancel_right₀ _ hr', div_self hx']
/-- The inner product of a nonzero vector with a nonzero multiple of
itself, divided by the product of their norms, has absolute value
1. -/
theorem abs_real_inner_div_norm_mul_norm_eq_one_of_ne_zero_of_ne_zero_mul {x : F} {r : ℝ}
(hx : x ≠ 0) (hr : r ≠ 0) : |⟪x, r • x⟫_ℝ| / (‖x‖ * ‖r • x‖) = 1 :=
norm_inner_div_norm_mul_norm_eq_one_of_ne_zero_of_ne_zero_mul hx hr
/-- The inner product of a nonzero vector with a positive multiple of
itself, divided by the product of their norms, has value 1. -/
theorem real_inner_div_norm_mul_norm_eq_one_of_ne_zero_of_pos_mul {x : F} {r : ℝ} (hx : x ≠ 0)
(hr : 0 < r) : ⟪x, r • x⟫_ℝ / (‖x‖ * ‖r • x‖) = 1 := by
rw [real_inner_smul_self_right, norm_smul, Real.norm_eq_abs, ← mul_assoc ‖x‖, mul_comm _ |r|,
mul_assoc, abs_of_nonneg hr.le, div_self]
exact mul_ne_zero hr.ne' (mul_self_ne_zero.2 (norm_ne_zero_iff.2 hx))
/-- The inner product of a nonzero vector with a negative multiple of
itself, divided by the product of their norms, has value -1. -/
theorem real_inner_div_norm_mul_norm_eq_neg_one_of_ne_zero_of_neg_mul {x : F} {r : ℝ} (hx : x ≠ 0)
(hr : r < 0) : ⟪x, r • x⟫_ℝ / (‖x‖ * ‖r • x‖) = -1 := by
rw [real_inner_smul_self_right, norm_smul, Real.norm_eq_abs, ← mul_assoc ‖x‖, mul_comm _ |r|,
mul_assoc, abs_of_neg hr, neg_mul, div_neg_eq_neg_div, div_self]
exact mul_ne_zero hr.ne (mul_self_ne_zero.2 (norm_ne_zero_iff.2 hx))
theorem norm_inner_eq_norm_tfae (x y : E) :
List.TFAE [‖⟪x, y⟫‖ = ‖x‖ * ‖y‖,
x = 0 ∨ y = (⟪x, y⟫ / ⟪x, x⟫) • x,
x = 0 ∨ ∃ r : 𝕜, y = r • x,
x = 0 ∨ y ∈ 𝕜 ∙ x] := by
tfae_have 1 → 2 := by
refine fun h => or_iff_not_imp_left.2 fun hx₀ => ?_
have : ‖x‖ ^ 2 ≠ 0 := pow_ne_zero _ (norm_ne_zero_iff.2 hx₀)
rw [← sq_eq_sq₀, mul_pow, ← mul_right_inj' this, eq_comm, ← sub_eq_zero, ← mul_sub] at h <;>
try positivity
simp only [@norm_sq_eq_re_inner 𝕜] at h
letI : InnerProductSpace.Core 𝕜 E := InnerProductSpace.toCore
erw [← InnerProductSpace.Core.cauchy_schwarz_aux (𝕜 := 𝕜) (F := E)] at h
rw [InnerProductSpace.Core.normSq_eq_zero, sub_eq_zero] at h
rw [div_eq_inv_mul, mul_smul, h, inv_smul_smul₀]
rwa [inner_self_ne_zero]
tfae_have 2 → 3 := fun h => h.imp_right fun h' => ⟨_, h'⟩
tfae_have 3 → 1 := by
rintro (rfl | ⟨r, rfl⟩) <;>
simp [inner_smul_right, norm_smul, inner_self_eq_norm_sq_to_K, inner_self_eq_norm_mul_norm,
sq, mul_left_comm]
tfae_have 3 ↔ 4 := by simp only [Submodule.mem_span_singleton, eq_comm]
tfae_finish
/-- If the inner product of two vectors is equal to the product of their norms, then the two vectors
are multiples of each other. One form of the equality case for Cauchy-Schwarz.
Compare `inner_eq_norm_mul_iff`, which takes the stronger hypothesis `⟪x, y⟫ = ‖x‖ * ‖y‖`. -/
theorem norm_inner_eq_norm_iff {x y : E} (hx₀ : x ≠ 0) (hy₀ : y ≠ 0) :
‖⟪x, y⟫‖ = ‖x‖ * ‖y‖ ↔ ∃ r : 𝕜, r ≠ 0 ∧ y = r • x :=
calc
‖⟪x, y⟫‖ = ‖x‖ * ‖y‖ ↔ x = 0 ∨ ∃ r : 𝕜, y = r • x :=
(@norm_inner_eq_norm_tfae 𝕜 _ _ _ _ x y).out 0 2
_ ↔ ∃ r : 𝕜, y = r • x := or_iff_right hx₀
_ ↔ ∃ r : 𝕜, r ≠ 0 ∧ y = r • x :=
⟨fun ⟨r, h⟩ => ⟨r, fun hr₀ => hy₀ <| h.symm ▸ smul_eq_zero.2 <| Or.inl hr₀, h⟩,
fun ⟨r, _hr₀, h⟩ => ⟨r, h⟩⟩
/-- The inner product of two vectors, divided by the product of their
norms, has absolute value 1 if and only if they are nonzero and one is
a multiple of the other. One form of equality case for Cauchy-Schwarz. -/
theorem norm_inner_div_norm_mul_norm_eq_one_iff (x y : E) :
‖⟪x, y⟫ / (‖x‖ * ‖y‖)‖ = 1 ↔ x ≠ 0 ∧ ∃ r : 𝕜, r ≠ 0 ∧ y = r • x := by
constructor
· intro h
have hx₀ : x ≠ 0 := fun h₀ => by simp [h₀] at h
have hy₀ : y ≠ 0 := fun h₀ => by simp [h₀] at h
refine ⟨hx₀, (norm_inner_eq_norm_iff hx₀ hy₀).1 <| eq_of_div_eq_one ?_⟩
simpa using h
· rintro ⟨hx, ⟨r, ⟨hr, rfl⟩⟩⟩
simp only [norm_div, norm_mul, norm_ofReal, abs_norm]
exact norm_inner_div_norm_mul_norm_eq_one_of_ne_zero_of_ne_zero_mul hx hr
/-- The inner product of two vectors, divided by the product of their
norms, has absolute value 1 if and only if they are nonzero and one is
a multiple of the other. One form of equality case for Cauchy-Schwarz. -/
theorem abs_real_inner_div_norm_mul_norm_eq_one_iff (x y : F) :
|⟪x, y⟫_ℝ / (‖x‖ * ‖y‖)| = 1 ↔ x ≠ 0 ∧ ∃ r : ℝ, r ≠ 0 ∧ y = r • x :=
@norm_inner_div_norm_mul_norm_eq_one_iff ℝ F _ _ _ x y
theorem inner_eq_norm_mul_iff_div {x y : E} (h₀ : x ≠ 0) :
⟪x, y⟫ = (‖x‖ : 𝕜) * ‖y‖ ↔ (‖y‖ / ‖x‖ : 𝕜) • x = y := by
have h₀' := h₀
rw [← norm_ne_zero_iff, Ne, ← @ofReal_eq_zero 𝕜] at h₀'
constructor <;> intro h
· have : x = 0 ∨ y = (⟪x, y⟫ / ⟪x, x⟫ : 𝕜) • x :=
((@norm_inner_eq_norm_tfae 𝕜 _ _ _ _ x y).out 0 1).1 (by simp [h])
rw [this.resolve_left h₀, h]
simp [norm_smul, inner_self_ofReal_norm, mul_div_cancel_right₀ _ h₀']
· conv_lhs => rw [← h, inner_smul_right, inner_self_eq_norm_sq_to_K]
field_simp [sq, mul_left_comm]
/-- If the inner product of two vectors is equal to the product of their norms (i.e.,
`⟪x, y⟫ = ‖x‖ * ‖y‖`), then the two vectors are nonnegative real multiples of each other. One form
of the equality case for Cauchy-Schwarz.
Compare `norm_inner_eq_norm_iff`, which takes the weaker hypothesis `abs ⟪x, y⟫ = ‖x‖ * ‖y‖`. -/
theorem inner_eq_norm_mul_iff {x y : E} :
⟪x, y⟫ = (‖x‖ : 𝕜) * ‖y‖ ↔ (‖y‖ : 𝕜) • x = (‖x‖ : 𝕜) • y := by
rcases eq_or_ne x 0 with (rfl | h₀)
· simp
· rw [inner_eq_norm_mul_iff_div h₀, div_eq_inv_mul, mul_smul, inv_smul_eq_iff₀]
rwa [Ne, ofReal_eq_zero, norm_eq_zero]
/-- If the inner product of two vectors is equal to the product of their norms (i.e.,
`⟪x, y⟫ = ‖x‖ * ‖y‖`), then the two vectors are nonnegative real multiples of each other. One form
of the equality case for Cauchy-Schwarz.
Compare `norm_inner_eq_norm_iff`, which takes the weaker hypothesis `abs ⟪x, y⟫ = ‖x‖ * ‖y‖`. -/
theorem inner_eq_norm_mul_iff_real {x y : F} : ⟪x, y⟫_ℝ = ‖x‖ * ‖y‖ ↔ ‖y‖ • x = ‖x‖ • y :=
inner_eq_norm_mul_iff
/-- The inner product of two vectors, divided by the product of their
norms, has value 1 if and only if they are nonzero and one is
a positive multiple of the other. -/
theorem real_inner_div_norm_mul_norm_eq_one_iff (x y : F) :
⟪x, y⟫_ℝ / (‖x‖ * ‖y‖) = 1 ↔ x ≠ 0 ∧ ∃ r : ℝ, 0 < r ∧ y = r • x := by
constructor
· intro h
have hx₀ : x ≠ 0 := fun h₀ => by simp [h₀] at h
have hy₀ : y ≠ 0 := fun h₀ => by simp [h₀] at h
refine ⟨hx₀, ‖y‖ / ‖x‖, div_pos (norm_pos_iff.2 hy₀) (norm_pos_iff.2 hx₀), ?_⟩
exact ((inner_eq_norm_mul_iff_div hx₀).1 (eq_of_div_eq_one h)).symm
· rintro ⟨hx, ⟨r, ⟨hr, rfl⟩⟩⟩
exact real_inner_div_norm_mul_norm_eq_one_of_ne_zero_of_pos_mul hx hr
/-- The inner product of two vectors, divided by the product of their
norms, has value -1 if and only if they are nonzero and one is
a negative multiple of the other. -/
theorem real_inner_div_norm_mul_norm_eq_neg_one_iff (x y : F) :
⟪x, y⟫_ℝ / (‖x‖ * ‖y‖) = -1 ↔ x ≠ 0 ∧ ∃ r : ℝ, r < 0 ∧ y = r • x := by
rw [← neg_eq_iff_eq_neg, ← neg_div, ← inner_neg_right, ← norm_neg y,
real_inner_div_norm_mul_norm_eq_one_iff, (@neg_surjective ℝ _).exists]
refine Iff.rfl.and (exists_congr fun r => ?_)
rw [neg_pos, neg_smul, neg_inj]
/-- If the inner product of two unit vectors is `1`, then the two vectors are equal. One form of
the equality case for Cauchy-Schwarz. -/
theorem inner_eq_one_iff_of_norm_one {x y : E} (hx : ‖x‖ = 1) (hy : ‖y‖ = 1) :
⟪x, y⟫ = 1 ↔ x = y := by
convert inner_eq_norm_mul_iff (𝕜 := 𝕜) (E := E) using 2 <;> simp [hx, hy]
theorem inner_lt_norm_mul_iff_real {x y : F} : ⟪x, y⟫_ℝ < ‖x‖ * ‖y‖ ↔ ‖y‖ • x ≠ ‖x‖ • y :=
calc
⟪x, y⟫_ℝ < ‖x‖ * ‖y‖ ↔ ⟪x, y⟫_ℝ ≠ ‖x‖ * ‖y‖ :=
⟨ne_of_lt, lt_of_le_of_ne (real_inner_le_norm _ _)⟩
_ ↔ ‖y‖ • x ≠ ‖x‖ • y := not_congr inner_eq_norm_mul_iff_real
/-- If the inner product of two unit vectors is strictly less than `1`, then the two vectors are
distinct. One form of the equality case for Cauchy-Schwarz. -/
theorem inner_lt_one_iff_real_of_norm_one {x y : F} (hx : ‖x‖ = 1) (hy : ‖y‖ = 1) :
⟪x, y⟫_ℝ < 1 ↔ x ≠ y := by convert inner_lt_norm_mul_iff_real (F := F) <;> simp [hx, hy]
/-- The sphere of radius `r = ‖y‖` is tangent to the plane `⟪x, y⟫ = ‖y‖ ^ 2` at `x = y`. -/
theorem eq_of_norm_le_re_inner_eq_norm_sq {x y : E} (hle : ‖x‖ ≤ ‖y‖) (h : re ⟪x, y⟫ = ‖y‖ ^ 2) :
x = y := by
suffices H : re ⟪x - y, x - y⟫ ≤ 0 by rwa [re_inner_self_nonpos, sub_eq_zero] at H
have H₁ : ‖x‖ ^ 2 ≤ ‖y‖ ^ 2 := by gcongr
have H₂ : re ⟪y, x⟫ = ‖y‖ ^ 2 := by rwa [← inner_conj_symm, conj_re]
simpa [inner_sub_left, inner_sub_right, ← norm_sq_eq_re_inner, h, H₂] using H₁
end Norm
section RCLike
local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y
/-- A field `𝕜` satisfying `RCLike` is itself a `𝕜`-inner product space. -/
instance RCLike.innerProductSpace : InnerProductSpace 𝕜 𝕜 where
inner x y := y * conj x
norm_sq_eq_re_inner x := by simp only [inner, mul_conj, ← ofReal_pow, ofReal_re]
conj_inner_symm x y := by simp only [mul_comm, map_mul, starRingEnd_self_apply]
add_left x y z := by simp only [mul_add, map_add]
smul_left x y z := by simp only [mul_comm (conj z), mul_assoc, smul_eq_mul, map_mul]
@[simp]
theorem RCLike.inner_apply (x y : 𝕜) : ⟪x, y⟫ = y * conj x :=
rfl
/-- A version of `RCLike.inner_apply` that swaps the order of multiplication. -/
theorem RCLike.inner_apply' (x y : 𝕜) : ⟪x, y⟫ = conj x * y := mul_comm _ _
end RCLike
section RCLikeToReal
open scoped InnerProductSpace
variable {G : Type*}
variable (𝕜 E)
variable [SeminormedAddCommGroup E] [InnerProductSpace 𝕜 E]
local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y
/-- A general inner product implies a real inner product. This is not registered as an instance
since `𝕜` does not appear in the return type `Inner ℝ E`. -/
def Inner.rclikeToReal : Inner ℝ E where inner x y := re ⟪x, y⟫
/-- A general inner product space structure implies a real inner product structure.
This is not registered as an instance since
* `𝕜` does not appear in the return type `InnerProductSpace ℝ E`,
* It is likely to create instance diamonds, as it builds upon the diamond-prone
`NormedSpace.restrictScalars`.
However, it can be used in a proof to obtain a real inner product space structure from a given
`𝕜`-inner product space structure. -/
-- See note [reducible non instances]
abbrev InnerProductSpace.rclikeToReal : InnerProductSpace ℝ E :=
{ Inner.rclikeToReal 𝕜 E,
NormedSpace.restrictScalars ℝ 𝕜
E with
norm_sq_eq_re_inner := norm_sq_eq_re_inner
| conj_inner_symm := fun _ _ => inner_re_symm _ _
add_left := fun x y z => by
change re ⟪x + y, z⟫ = re ⟪x, z⟫ + re ⟪y, z⟫
simp only [inner_add_left, map_add]
smul_left := fun x y r => by
change re ⟪(r : 𝕜) • x, y⟫ = r * re ⟪x, y⟫
simp only [inner_smul_left, conj_ofReal, re_ofReal_mul] }
| Mathlib/Analysis/InnerProductSpace/Basic.lean | 854 | 860 |
/-
Copyright (c) 2018 Mario Carneiro. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Mario Carneiro, Yury Kudryashov
-/
import Mathlib.MeasureTheory.OuterMeasure.Basic
/-!
# The “almost everywhere” filter of co-null sets.
If `μ` is an outer measure or a measure on `α`,
then `MeasureTheory.ae μ` is the filter of co-null sets: `s ∈ ae μ ↔ μ sᶜ = 0`.
In this file we define the filter and prove some basic theorems about it.
## Notation
- `∀ᵐ x ∂μ, p x`: the predicate `p` holds for `μ`-a.e. all `x`;
- `∃ᶠ x ∂μ, p x`: the predicate `p` holds on a set of nonzero measure;
- `f =ᵐ[μ] g`: `f x = g x` for `μ`-a.e. all `x`;
- `f ≤ᵐ[μ] g`: `f x ≤ g x` for `μ`-a.e. all `x`.
## Implementation details
All notation introduced in this file
reducibly unfolds to the corresponding definitions about filters,
so generic lemmas about `Filter.Eventually`, `Filter.EventuallyEq` etc apply.
However, we restate some lemmas specifically for `ae`.
## Tags
outer measure, measure, almost everywhere
-/
open Filter Set
open scoped ENNReal
namespace MeasureTheory
variable {α β F : Type*} [FunLike F (Set α) ℝ≥0∞] [OuterMeasureClass F α] {μ : F} {s t : Set α}
/-- The “almost everywhere” filter of co-null sets. -/
def ae (μ : F) : Filter α :=
.ofCountableUnion (μ · = 0) (fun _S hSc ↦ (measure_sUnion_null_iff hSc).2) fun _t ht _s hs ↦
measure_mono_null hs ht
/-- `∀ᵐ a ∂μ, p a` means that `p a` for a.e. `a`, i.e. `p` holds true away from a null set.
This is notation for `Filter.Eventually p (MeasureTheory.ae μ)`. -/
notation3 "∀ᵐ "(...)" ∂"μ", "r:(scoped p => Filter.Eventually p <| MeasureTheory.ae μ) => r
/-- `∃ᵐ a ∂μ, p a` means that `p` holds `∂μ`-frequently,
i.e. `p` holds on a set of positive measure.
This is notation for `Filter.Frequently p (MeasureTheory.ae μ)`. -/
notation3 "∃ᵐ "(...)" ∂"μ", "r:(scoped P => Filter.Frequently P <| MeasureTheory.ae μ) => r
/-- `f =ᵐ[μ] g` means `f` and `g` are eventually equal along the a.e. filter,
i.e. `f=g` away from a null set.
This is notation for `Filter.EventuallyEq (MeasureTheory.ae μ) f g`. -/
notation:50 f " =ᵐ[" μ:50 "] " g:50 => Filter.EventuallyEq (MeasureTheory.ae μ) f g
/-- `f ≤ᵐ[μ] g` means `f` is eventually less than `g` along the a.e. filter,
i.e. `f ≤ g` away from a null set.
This is notation for `Filter.EventuallyLE (MeasureTheory.ae μ) f g`. -/
notation:50 f " ≤ᵐ[" μ:50 "] " g:50 => Filter.EventuallyLE (MeasureTheory.ae μ) f g
theorem mem_ae_iff {s : Set α} : s ∈ ae μ ↔ μ sᶜ = 0 :=
Iff.rfl
theorem ae_iff {p : α → Prop} : (∀ᵐ a ∂μ, p a) ↔ μ { a | ¬p a } = 0 :=
Iff.rfl
theorem compl_mem_ae_iff {s : Set α} : sᶜ ∈ ae μ ↔ μ s = 0 := by simp only [mem_ae_iff, compl_compl]
theorem frequently_ae_iff {p : α → Prop} : (∃ᵐ a ∂μ, p a) ↔ μ { a | p a } ≠ 0 :=
not_congr compl_mem_ae_iff
theorem frequently_ae_mem_iff {s : Set α} : (∃ᵐ a ∂μ, a ∈ s) ↔ μ s ≠ 0 :=
not_congr compl_mem_ae_iff
theorem measure_zero_iff_ae_nmem {s : Set α} : μ s = 0 ↔ ∀ᵐ a ∂μ, a ∉ s :=
compl_mem_ae_iff.symm
theorem ae_of_all {p : α → Prop} (μ : F) : (∀ a, p a) → ∀ᵐ a ∂μ, p a :=
Eventually.of_forall
instance instCountableInterFilter : CountableInterFilter (ae μ) := by
unfold ae; infer_instance
theorem ae_all_iff {ι : Sort*} [Countable ι] {p : α → ι → Prop} :
(∀ᵐ a ∂μ, ∀ i, p a i) ↔ ∀ i, ∀ᵐ a ∂μ, p a i :=
eventually_countable_forall
theorem all_ae_of {ι : Sort*} {p : α → ι → Prop} (hp : ∀ᵐ a ∂μ, ∀ i, p a i) (i : ι) :
∀ᵐ a ∂μ, p a i := by
filter_upwards [hp] with a ha using ha i
lemma ae_iff_of_countable [Countable α] {p : α → Prop} : (∀ᵐ x ∂μ, p x) ↔ ∀ x, μ {x} ≠ 0 → p x := by
rw [ae_iff, measure_null_iff_singleton]
exacts [forall_congr' fun _ ↦ not_imp_comm, Set.to_countable _]
theorem ae_ball_iff {ι : Type*} {S : Set ι} (hS : S.Countable) {p : α → ∀ i ∈ S, Prop} :
(∀ᵐ x ∂μ, ∀ i (hi : i ∈ S), p x i hi) ↔ ∀ i (hi : i ∈ S), ∀ᵐ x ∂μ, p x i hi :=
eventually_countable_ball hS
lemma ae_eq_refl (f : α → β) : f =ᵐ[μ] f := EventuallyEq.rfl
lemma ae_eq_rfl {f : α → β} : f =ᵐ[μ] f := EventuallyEq.rfl
lemma ae_eq_comm {f g : α → β} : f =ᵐ[μ] g ↔ g =ᵐ[μ] f := eventuallyEq_comm
theorem ae_eq_symm {f g : α → β} (h : f =ᵐ[μ] g) : g =ᵐ[μ] f :=
h.symm
theorem ae_eq_trans {f g h : α → β} (h₁ : f =ᵐ[μ] g) (h₂ : g =ᵐ[μ] h) : f =ᵐ[μ] h :=
h₁.trans h₂
@[simp] lemma ae_eq_top : ae μ = ⊤ ↔ ∀ a, μ {a} ≠ 0 := by
simp only [Filter.ext_iff, mem_ae_iff, mem_top, ne_eq]
refine ⟨fun h a ha ↦ by simpa [ha] using (h {a}ᶜ).1, fun h s ↦ ⟨fun hs ↦ ?_, ?_⟩⟩
· rw [← compl_empty_iff, ← not_nonempty_iff_eq_empty]
rintro ⟨a, ha⟩
exact h _ <| measure_mono_null (singleton_subset_iff.2 ha) hs
· rintro rfl
simp
theorem ae_le_of_ae_lt {β : Type*} [Preorder β] {f g : α → β} (h : ∀ᵐ x ∂μ, f x < g x) :
f ≤ᵐ[μ] g :=
h.mono fun _ ↦ le_of_lt
@[simp]
theorem ae_eq_empty : s =ᵐ[μ] (∅ : Set α) ↔ μ s = 0 :=
eventuallyEq_empty.trans <| by simp only [ae_iff, Classical.not_not, setOf_mem_eq]
-- The priority should be higher than `eventuallyEq_univ`.
@[simp high]
theorem ae_eq_univ : s =ᵐ[μ] (univ : Set α) ↔ μ sᶜ = 0 :=
eventuallyEq_univ
theorem ae_le_set : s ≤ᵐ[μ] t ↔ μ (s \ t) = 0 :=
calc
s ≤ᵐ[μ] t ↔ ∀ᵐ x ∂μ, x ∈ s → x ∈ t := Iff.rfl
_ ↔ μ (s \ t) = 0 := by simp [ae_iff]; rfl
theorem ae_le_set_inter {s' t' : Set α} (h : s ≤ᵐ[μ] t) (h' : s' ≤ᵐ[μ] t') :
(s ∩ s' : Set α) ≤ᵐ[μ] (t ∩ t' : Set α) :=
| h.inter h'
theorem ae_le_set_union {s' t' : Set α} (h : s ≤ᵐ[μ] t) (h' : s' ≤ᵐ[μ] t') :
(s ∪ s' : Set α) ≤ᵐ[μ] (t ∪ t' : Set α) :=
| Mathlib/MeasureTheory/OuterMeasure/AE.lean | 148 | 151 |
/-
Copyright (c) 2022 Kevin H. Wilson. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Kevin H. Wilson
-/
import Mathlib.Order.Filter.Prod
/-!
# Curried Filters
This file provides an operation (`Filter.curry`) on filters which provides the equivalence
`∀ᶠ a in l, ∀ᶠ b in l', p (a, b) ↔ ∀ᶠ c in (l.curry l'), p c` (see `Filter.eventually_curry_iff`).
To understand when this operation might arise, it is helpful to think of `∀ᶠ` as a combination of
the quantifiers `∃ ∀`. For instance, `∀ᶠ n in atTop, p n ↔ ∃ N, ∀ n ≥ N, p n`. A curried filter
yields the quantifier order `∃ ∀ ∃ ∀`. For instance,
`∀ᶠ n in atTop.curry atTop, p n ↔ ∃ M, ∀ m ≥ M, ∃ N, ∀ n ≥ N, p (m, n)`.
This is different from a product filter, which instead yields a quantifier order `∃ ∃ ∀ ∀`. For
instance, `∀ᶠ n in atTop ×ˢ atTop, p n ↔ ∃ M, ∃ N, ∀ m ≥ M, ∀ n ≥ N, p (m, n)`. This makes it
clear that if something eventually occurs on the product filter, it eventually occurs on the curried
filter (see `Filter.curry_le_prod` and `Filter.Eventually.curry`), but the converse is not true.
Another way to think about the curried versus the product filter is that tending to some limit on
the product filter is a version of uniform convergence (see `tendsto_prod_filter_iff`) whereas
tending to some limit on a curried filter is just iterated limits (see `Filter.Tendsto.curry`).
In the "generalized set" intuition, `Filter.prod` and `Filter.curry` correspond to two ways of
describing the product of two sets, namely `s ×ˢ t = fst ⁻¹' s ∩ snd ⁻¹' t` and
`s ×ˢ t = ⋃ x ∈ s, (x, ·) '' t`.
## Main definitions
* `Filter.curry`: A binary operation on filters which represents iterated limits
## Main statements
* `Filter.eventually_curry_iff`: An alternative definition of a curried filter
* `Filter.curry_le_prod`: Something that is eventually true on the a product filter is eventually
true on the curried filter
## Tags
uniform convergence, curried filters, product filters
-/
namespace Filter
variable {α β γ : Type*} {l : Filter α} {m : Filter β} {s : Set α} {t : Set β}
theorem eventually_curry_iff {p : α × β → Prop} :
(∀ᶠ x : α × β in l.curry m, p x) ↔ ∀ᶠ x : α in l, ∀ᶠ y : β in m, p (x, y) :=
Iff.rfl
theorem frequently_curry_iff
(p : (α × β) → Prop) : (∃ᶠ x in l.curry m, p x) ↔ ∃ᶠ x in l, ∃ᶠ y in m, p (x, y) := by
simp_rw [Filter.Frequently, not_iff_not, not_not, eventually_curry_iff]
theorem mem_curry_iff {s : Set (α × β)} :
s ∈ l.curry m ↔ ∀ᶠ x : α in l, ∀ᶠ y : β in m, (x, y) ∈ s := Iff.rfl
theorem curry_le_prod : l.curry m ≤ l ×ˢ m := fun _ => Eventually.curry
theorem Tendsto.curry {f : α → β → γ} {la : Filter α} {lb : Filter β} {lc : Filter γ}
(h : ∀ᶠ a in la, Tendsto (fun b : β => f a b) lb lc) : Tendsto (↿f) (la.curry lb) lc :=
fun _s hs => h.mono fun _a ha => ha hs
theorem frequently_curry_prod_iff :
(∃ᶠ x in l.curry m, x ∈ s ×ˢ t) ↔ (∃ᶠ x in l, x ∈ s) ∧ ∃ᶠ y in m, y ∈ t := by
simp [frequently_curry_iff]
theorem eventually_curry_prod_iff [NeBot l] [NeBot m] :
(∀ᶠ x in l.curry m, x ∈ s ×ˢ t) ↔ s ∈ l ∧ t ∈ m := by
simp [eventually_curry_iff]
theorem prod_mem_curry (hs : s ∈ l) (ht : t ∈ m) : s ×ˢ t ∈ l.curry m :=
curry_le_prod <| prod_mem_prod hs ht
end Filter
| Mathlib/Order/Filter/Curry.lean | 83 | 88 | |
/-
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
@[deprecated (since := "2025-01-17")] alias edist_eq_coe_nnnorm' := edist_one_eq_enorm
@[to_additive]
theorem mem_emetric_ball_one_iff {r : ℝ≥0∞} : a ∈ EMetric.ball 1 r ↔ ‖a‖ₑ < r := by
rw [EMetric.mem_ball, edist_one_eq_enorm]
end ENorm
section ContinuousENorm
variable {E : Type*} [TopologicalSpace E] [ContinuousENorm E]
@[continuity, fun_prop]
lemma continuous_enorm : Continuous fun a : E ↦ ‖a‖ₑ := ContinuousENorm.continuous_enorm
variable {X : Type*} [TopologicalSpace X] {f : X → E} {s : Set X} {a : X}
@[fun_prop]
lemma Continuous.enorm : Continuous f → Continuous (‖f ·‖ₑ) :=
continuous_enorm.comp
lemma ContinuousAt.enorm {a : X} (h : ContinuousAt f a) : ContinuousAt (‖f ·‖ₑ) a := by fun_prop
@[fun_prop]
lemma ContinuousWithinAt.enorm {s : Set X} {a : X} (h : ContinuousWithinAt f s a) :
ContinuousWithinAt (‖f ·‖ₑ) s a :=
(ContinuousENorm.continuous_enorm.continuousWithinAt).comp (t := Set.univ) h
(fun _ _ ↦ by trivial)
@[fun_prop]
lemma ContinuousOn.enorm (h : ContinuousOn f s) : ContinuousOn (‖f ·‖ₑ) s :=
(ContinuousENorm.continuous_enorm.continuousOn).comp (t := Set.univ) h <| Set.mapsTo_univ _ _
end ContinuousENorm
section ENormedMonoid
variable {E : Type*} [TopologicalSpace E] [ENormedMonoid E]
@[to_additive enorm_add_le]
lemma enorm_mul_le' (a b : E) : ‖a * b‖ₑ ≤ ‖a‖ₑ + ‖b‖ₑ := ENormedMonoid.enorm_mul_le a b
@[to_additive (attr := simp) enorm_eq_zero]
lemma enorm_eq_zero' {a : E} : ‖a‖ₑ = 0 ↔ a = 1 := by
simp [enorm, ENormedMonoid.enorm_eq_zero]
@[to_additive enorm_ne_zero]
lemma enorm_ne_zero' {a : E} : ‖a‖ₑ ≠ 0 ↔ a ≠ 1 :=
enorm_eq_zero'.ne
@[to_additive (attr := simp) enorm_pos]
lemma enorm_pos' {a : E} : 0 < ‖a‖ₑ ↔ a ≠ 1 :=
pos_iff_ne_zero.trans enorm_ne_zero'
end ENormedMonoid
instance : ENormedAddCommMonoid ℝ≥0∞ where
continuous_enorm := continuous_id
enorm_eq_zero := by simp
enorm_add_le := by simp
open Set in
@[to_additive]
lemma SeminormedGroup.disjoint_nhds (x : E) (f : Filter E) :
Disjoint (𝓝 x) f ↔ ∃ δ > 0, ∀ᶠ y in f, δ ≤ ‖y / x‖ := by
simp [NormedCommGroup.nhds_basis_norm_lt x |>.disjoint_iff_left, compl_setOf, eventually_iff]
@[to_additive]
lemma SeminormedGroup.disjoint_nhds_one (f : Filter E) :
Disjoint (𝓝 1) f ↔ ∃ δ > 0, ∀ᶠ y in f, δ ≤ ‖y‖ := by
simpa using disjoint_nhds 1 f
end SeminormedGroup
section Induced
variable (E F)
variable [FunLike 𝓕 E F]
-- See note [reducible non-instances]
/-- A group homomorphism from a `Group` to a `SeminormedGroup` induces a `SeminormedGroup`
structure on the domain. -/
@[to_additive "A group homomorphism from an `AddGroup` to a
`SeminormedAddGroup` induces a `SeminormedAddGroup` structure on the domain."]
abbrev SeminormedGroup.induced [Group E] [SeminormedGroup F] [MonoidHomClass 𝓕 E F] (f : 𝓕) :
SeminormedGroup E :=
{ PseudoMetricSpace.induced f toPseudoMetricSpace with
norm := fun x => ‖f x‖
dist_eq := fun x y => by simp only [map_div, ← dist_eq_norm_div]; rfl }
-- See note [reducible non-instances]
/-- A group homomorphism from a `CommGroup` to a `SeminormedGroup` induces a
`SeminormedCommGroup` structure on the domain. -/
@[to_additive "A group homomorphism from an `AddCommGroup` to a
`SeminormedAddGroup` induces a `SeminormedAddCommGroup` structure on the domain."]
abbrev SeminormedCommGroup.induced
[CommGroup E] [SeminormedGroup F] [MonoidHomClass 𝓕 E F] (f : 𝓕) :
SeminormedCommGroup E :=
{ SeminormedGroup.induced E F f with
mul_comm := mul_comm }
-- See note [reducible non-instances].
/-- An injective group homomorphism from a `Group` to a `NormedGroup` induces a `NormedGroup`
structure on the domain. -/
@[to_additive "An injective group homomorphism from an `AddGroup` to a
`NormedAddGroup` induces a `NormedAddGroup` structure on the domain."]
abbrev NormedGroup.induced
[Group E] [NormedGroup F] [MonoidHomClass 𝓕 E F] (f : 𝓕) (h : Injective f) :
NormedGroup E :=
{ SeminormedGroup.induced E F f, MetricSpace.induced f h _ with }
-- See note [reducible non-instances].
/-- An injective group homomorphism from a `CommGroup` to a `NormedGroup` induces a
`NormedCommGroup` structure on the domain. -/
@[to_additive "An injective group homomorphism from a `CommGroup` to a
`NormedCommGroup` induces a `NormedCommGroup` structure on the domain."]
abbrev NormedCommGroup.induced [CommGroup E] [NormedGroup F] [MonoidHomClass 𝓕 E F] (f : 𝓕)
(h : Injective f) : NormedCommGroup E :=
{ SeminormedGroup.induced E F f, MetricSpace.induced f h _ with
mul_comm := mul_comm }
end Induced
namespace Real
variable {r : ℝ}
instance norm : Norm ℝ where
norm r := |r|
@[simp]
theorem norm_eq_abs (r : ℝ) : ‖r‖ = |r| :=
rfl
instance normedAddCommGroup : NormedAddCommGroup ℝ :=
⟨fun _r _y => rfl⟩
theorem norm_of_nonneg (hr : 0 ≤ r) : ‖r‖ = r :=
abs_of_nonneg hr
theorem norm_of_nonpos (hr : r ≤ 0) : ‖r‖ = -r :=
abs_of_nonpos hr
theorem le_norm_self (r : ℝ) : r ≤ ‖r‖ :=
le_abs_self r
@[simp 1100] lemma norm_natCast (n : ℕ) : ‖(n : ℝ)‖ = n := abs_of_nonneg n.cast_nonneg
@[simp 1100] lemma nnnorm_natCast (n : ℕ) : ‖(n : ℝ)‖₊ = n := NNReal.eq <| norm_natCast _
@[simp 1100] lemma enorm_natCast (n : ℕ) : ‖(n : ℝ)‖ₑ = n := by simp [enorm]
@[simp 1100] lemma norm_ofNat (n : ℕ) [n.AtLeastTwo] :
‖(ofNat(n) : ℝ)‖ = ofNat(n) := norm_natCast n
@[simp 1100] lemma nnnorm_ofNat (n : ℕ) [n.AtLeastTwo] :
‖(ofNat(n) : ℝ)‖₊ = ofNat(n) := nnnorm_natCast n
lemma norm_two : ‖(2 : ℝ)‖ = 2 := abs_of_pos zero_lt_two
lemma nnnorm_two : ‖(2 : ℝ)‖₊ = 2 := NNReal.eq <| by simp
@[simp 1100, norm_cast]
lemma norm_nnratCast (q : ℚ≥0) : ‖(q : ℝ)‖ = q := norm_of_nonneg q.cast_nonneg
@[simp 1100, norm_cast]
lemma nnnorm_nnratCast (q : ℚ≥0) : ‖(q : ℝ)‖₊ = q := by simp [nnnorm, -norm_eq_abs]
theorem nnnorm_of_nonneg (hr : 0 ≤ r) : ‖r‖₊ = ⟨r, hr⟩ :=
NNReal.eq <| norm_of_nonneg hr
lemma enorm_of_nonneg (hr : 0 ≤ r) : ‖r‖ₑ = .ofReal r := by
simp [enorm, nnnorm_of_nonneg hr, ENNReal.ofReal, toNNReal, hr]
@[simp] lemma nnnorm_abs (r : ℝ) : ‖|r|‖₊ = ‖r‖₊ := by simp [nnnorm]
@[simp] lemma enorm_abs (r : ℝ) : ‖|r|‖ₑ = ‖r‖ₑ := by simp [enorm]
theorem enorm_eq_ofReal (hr : 0 ≤ r) : ‖r‖ₑ = .ofReal r := by
rw [← ofReal_norm_eq_enorm, norm_of_nonneg hr]
@[deprecated (since := "2025-01-17")] alias ennnorm_eq_ofReal := enorm_eq_ofReal
theorem enorm_eq_ofReal_abs (r : ℝ) : ‖r‖ₑ = ENNReal.ofReal |r| := by
rw [← enorm_eq_ofReal (abs_nonneg _), enorm_abs]
@[deprecated (since := "2025-01-17")] alias ennnorm_eq_ofReal_abs := enorm_eq_ofReal_abs
theorem toNNReal_eq_nnnorm_of_nonneg (hr : 0 ≤ r) : r.toNNReal = ‖r‖₊ := by
rw [Real.toNNReal_of_nonneg hr]
ext
rw [coe_mk, coe_nnnorm r, Real.norm_eq_abs r, abs_of_nonneg hr]
-- Porting note: this is due to the change from `Subtype.val` to `NNReal.toReal` for the coercion
theorem ofReal_le_enorm (r : ℝ) : ENNReal.ofReal r ≤ ‖r‖ₑ := by
rw [enorm_eq_ofReal_abs]; gcongr; exact le_abs_self _
@[deprecated (since := "2025-01-17")] alias ofReal_le_ennnorm := ofReal_le_enorm
end Real
namespace NNReal
instance : NNNorm ℝ≥0 where
nnnorm x := x
@[simp] lemma nnnorm_eq_self (x : ℝ≥0) : ‖x‖₊ = x := rfl
end NNReal
section SeminormedCommGroup
variable [SeminormedCommGroup E] [SeminormedCommGroup F] {a b : E} {r : ℝ}
@[to_additive]
theorem dist_inv (x y : E) : dist x⁻¹ y = dist x y⁻¹ := by
simp_rw [dist_eq_norm_div, ← norm_inv' (x⁻¹ / y), inv_div, div_inv_eq_mul, mul_comm]
theorem norm_multiset_sum_le {E} [SeminormedAddCommGroup E] (m : Multiset E) :
‖m.sum‖ ≤ (m.map fun x => ‖x‖).sum :=
m.le_sum_of_subadditive norm norm_zero norm_add_le
@[to_additive existing]
theorem norm_multiset_prod_le (m : Multiset E) : ‖m.prod‖ ≤ (m.map fun x => ‖x‖).sum := by
rw [← Multiplicative.ofAdd_le, ofAdd_multiset_prod, Multiset.map_map]
refine Multiset.le_prod_of_submultiplicative (Multiplicative.ofAdd ∘ norm) ?_ (fun x y => ?_) _
· simp only [comp_apply, norm_one', ofAdd_zero]
· exact norm_mul_le' x y
@[bound]
theorem norm_sum_le {ι E} [SeminormedAddCommGroup E] (s : Finset ι) (f : ι → E) :
‖∑ i ∈ s, f i‖ ≤ ∑ i ∈ s, ‖f i‖ :=
s.le_sum_of_subadditive norm norm_zero norm_add_le f
@[to_additive existing]
theorem norm_prod_le (s : Finset ι) (f : ι → E) : ‖∏ i ∈ s, f i‖ ≤ ∑ i ∈ s, ‖f i‖ := by
rw [← Multiplicative.ofAdd_le, ofAdd_sum]
refine Finset.le_prod_of_submultiplicative (Multiplicative.ofAdd ∘ norm) ?_ (fun x y => ?_) _ _
· simp only [comp_apply, norm_one', ofAdd_zero]
· exact norm_mul_le' x y
@[to_additive]
theorem norm_prod_le_of_le (s : Finset ι) {f : ι → E} {n : ι → ℝ} (h : ∀ b ∈ s, ‖f b‖ ≤ n b) :
‖∏ b ∈ s, f b‖ ≤ ∑ b ∈ s, n b :=
(norm_prod_le s f).trans <| Finset.sum_le_sum h
@[to_additive]
theorem dist_prod_prod_le_of_le (s : Finset ι) {f a : ι → E} {d : ι → ℝ}
(h : ∀ b ∈ s, dist (f b) (a b) ≤ d b) :
dist (∏ b ∈ s, f b) (∏ b ∈ s, a b) ≤ ∑ b ∈ s, d b := by
simp only [dist_eq_norm_div, ← Finset.prod_div_distrib] at *
exact norm_prod_le_of_le s h
@[to_additive]
theorem dist_prod_prod_le (s : Finset ι) (f a : ι → E) :
dist (∏ b ∈ s, f b) (∏ b ∈ s, a b) ≤ ∑ b ∈ s, dist (f b) (a b) :=
dist_prod_prod_le_of_le s fun _ _ => le_rfl
@[to_additive]
theorem mul_mem_ball_iff_norm : a * b ∈ ball a r ↔ ‖b‖ < r := by
rw [mem_ball_iff_norm'', mul_div_cancel_left]
@[to_additive]
theorem mul_mem_closedBall_iff_norm : a * b ∈ closedBall a r ↔ ‖b‖ ≤ r := by
rw [mem_closedBall_iff_norm'', mul_div_cancel_left]
@[to_additive (attr := simp 1001)]
-- Porting note: increase priority so that the left-hand side doesn't simplify
theorem preimage_mul_ball (a b : E) (r : ℝ) : (b * ·) ⁻¹' ball a r = ball (a / b) r := by
ext c
simp only [dist_eq_norm_div, Set.mem_preimage, mem_ball, div_div_eq_mul_div, mul_comm]
@[to_additive (attr := simp 1001)]
-- Porting note: increase priority so that the left-hand side doesn't simplify
theorem preimage_mul_closedBall (a b : E) (r : ℝ) :
(b * ·) ⁻¹' closedBall a r = closedBall (a / b) r := by
ext c
simp only [dist_eq_norm_div, Set.mem_preimage, mem_closedBall, div_div_eq_mul_div, mul_comm]
@[to_additive (attr := simp)]
theorem preimage_mul_sphere (a b : E) (r : ℝ) : (b * ·) ⁻¹' sphere a r = sphere (a / b) r := by
ext c
simp only [Set.mem_preimage, mem_sphere_iff_norm', div_div_eq_mul_div, mul_comm]
@[to_additive]
theorem pow_mem_closedBall {n : ℕ} (h : a ∈ closedBall b r) :
a ^ n ∈ closedBall (b ^ n) (n • r) := by
simp only [mem_closedBall, dist_eq_norm_div, ← div_pow] at h ⊢
refine norm_pow_le_mul_norm.trans ?_
simpa only [nsmul_eq_mul] using mul_le_mul_of_nonneg_left h n.cast_nonneg
@[to_additive]
theorem pow_mem_ball {n : ℕ} (hn : 0 < n) (h : a ∈ ball b r) : a ^ n ∈ ball (b ^ n) (n • r) := by
simp only [mem_ball, dist_eq_norm_div, ← div_pow] at h ⊢
refine lt_of_le_of_lt norm_pow_le_mul_norm ?_
replace hn : 0 < (n : ℝ) := by norm_cast
rw [nsmul_eq_mul]
nlinarith
@[to_additive]
theorem mul_mem_closedBall_mul_iff {c : E} : a * c ∈ closedBall (b * c) r ↔ a ∈ closedBall b r := by
simp only [mem_closedBall, dist_eq_norm_div, mul_div_mul_right_eq_div]
@[to_additive]
theorem mul_mem_ball_mul_iff {c : E} : a * c ∈ ball (b * c) r ↔ a ∈ ball b r := by
simp only [mem_ball, dist_eq_norm_div, mul_div_mul_right_eq_div]
@[to_additive]
theorem smul_closedBall'' : a • closedBall b r = closedBall (a • b) r := by
ext
simp [mem_closedBall, Set.mem_smul_set, dist_eq_norm_div, div_eq_inv_mul, ←
eq_inv_mul_iff_mul_eq, mul_assoc]
@[to_additive]
theorem smul_ball'' : a • ball b r = ball (a • b) r := by
ext
simp [mem_ball, Set.mem_smul_set, dist_eq_norm_div, _root_.div_eq_inv_mul,
← eq_inv_mul_iff_mul_eq, mul_assoc]
@[to_additive]
theorem nnnorm_multiset_prod_le (m : Multiset E) : ‖m.prod‖₊ ≤ (m.map fun x => ‖x‖₊).sum :=
NNReal.coe_le_coe.1 <| by
push_cast
rw [Multiset.map_map]
exact norm_multiset_prod_le _
@[to_additive]
theorem nnnorm_prod_le (s : Finset ι) (f : ι → E) : ‖∏ a ∈ s, f a‖₊ ≤ ∑ a ∈ s, ‖f a‖₊ :=
NNReal.coe_le_coe.1 <| by
push_cast
exact norm_prod_le _ _
@[to_additive]
theorem nnnorm_prod_le_of_le (s : Finset ι) {f : ι → E} {n : ι → ℝ≥0} (h : ∀ b ∈ s, ‖f b‖₊ ≤ n b) :
‖∏ b ∈ s, f b‖₊ ≤ ∑ b ∈ s, n b :=
(norm_prod_le_of_le s h).trans_eq (NNReal.coe_sum ..).symm
-- Porting note: increase priority so that the LHS doesn't simplify
@[to_additive (attr := simp 1001) norm_norm]
lemma norm_norm' (x : E) : ‖‖x‖‖ = ‖x‖ := Real.norm_of_nonneg (norm_nonneg' _)
@[to_additive (attr := simp) nnnorm_norm]
lemma nnnorm_norm' (x : E) : ‖‖x‖‖₊ = ‖x‖₊ := by simp [nnnorm]
@[to_additive (attr := simp) enorm_norm]
lemma enorm_norm' (x : E) : ‖‖x‖‖ₑ = ‖x‖ₑ := by simp [enorm]
lemma enorm_enorm {ε : Type*} [ENorm ε] (x : ε) : ‖‖x‖ₑ‖ₑ = ‖x‖ₑ := by simp [enorm]
end SeminormedCommGroup
section NormedGroup
variable [NormedGroup E] {a b : E}
@[to_additive (attr := simp) norm_le_zero_iff]
lemma norm_le_zero_iff' : ‖a‖ ≤ 0 ↔ a = 1 := by rw [← dist_one_right, dist_le_zero]
@[to_additive (attr := simp) norm_pos_iff]
lemma norm_pos_iff' : 0 < ‖a‖ ↔ a ≠ 1 := by rw [← not_le, norm_le_zero_iff']
@[to_additive (attr := simp) norm_eq_zero]
lemma norm_eq_zero' : ‖a‖ = 0 ↔ a = 1 := (norm_nonneg' a).le_iff_eq.symm.trans norm_le_zero_iff'
@[to_additive norm_ne_zero_iff]
lemma norm_ne_zero_iff' : ‖a‖ ≠ 0 ↔ a ≠ 1 := norm_eq_zero'.not
@[deprecated (since := "2024-11-24")] alias norm_le_zero_iff'' := norm_le_zero_iff'
@[deprecated (since := "2024-11-24")] alias norm_le_zero_iff''' := norm_le_zero_iff'
@[deprecated (since := "2024-11-24")] alias norm_pos_iff'' := norm_pos_iff'
@[deprecated (since := "2024-11-24")] alias norm_eq_zero'' := norm_eq_zero'
@[deprecated (since := "2024-11-24")] alias norm_eq_zero''' := norm_eq_zero'
@[to_additive]
theorem norm_div_eq_zero_iff : ‖a / b‖ = 0 ↔ a = b := by rw [norm_eq_zero', div_eq_one]
@[to_additive]
theorem norm_div_pos_iff : 0 < ‖a / b‖ ↔ a ≠ b := by
rw [(norm_nonneg' _).lt_iff_ne, ne_comm]
exact norm_div_eq_zero_iff.not
@[to_additive eq_of_norm_sub_le_zero]
theorem eq_of_norm_div_le_zero (h : ‖a / b‖ ≤ 0) : a = b := by
rwa [← div_eq_one, ← norm_le_zero_iff']
alias ⟨eq_of_norm_div_eq_zero, _⟩ := norm_div_eq_zero_iff
attribute [to_additive] eq_of_norm_div_eq_zero
@[to_additive]
theorem eq_one_or_norm_pos (a : E) : a = 1 ∨ 0 < ‖a‖ := by
simpa [eq_comm] using (norm_nonneg' a).eq_or_lt
@[to_additive]
theorem eq_one_or_nnnorm_pos (a : E) : a = 1 ∨ 0 < ‖a‖₊ :=
eq_one_or_norm_pos a
@[to_additive (attr := simp) nnnorm_eq_zero]
theorem nnnorm_eq_zero' : ‖a‖₊ = 0 ↔ a = 1 := by
rw [← NNReal.coe_eq_zero, coe_nnnorm', norm_eq_zero']
@[to_additive nnnorm_ne_zero_iff]
theorem nnnorm_ne_zero_iff' : ‖a‖₊ ≠ 0 ↔ a ≠ 1 :=
nnnorm_eq_zero'.not
@[to_additive (attr := simp) nnnorm_pos]
lemma nnnorm_pos' : 0 < ‖a‖₊ ↔ a ≠ 1 := pos_iff_ne_zero.trans nnnorm_ne_zero_iff'
variable (E)
/-- The norm of a normed group as a group norm. -/
@[to_additive "The norm of a normed group as an additive group norm."]
def normGroupNorm : GroupNorm E :=
{ normGroupSeminorm _ with eq_one_of_map_eq_zero' := fun _ => norm_eq_zero'.1 }
@[simp]
theorem coe_normGroupNorm : ⇑(normGroupNorm E) = norm :=
rfl
end NormedGroup
section NormedAddGroup
variable [NormedAddGroup E] [TopologicalSpace α] {f : α → E}
/-! Some relations with `HasCompactSupport` -/
theorem hasCompactSupport_norm_iff : (HasCompactSupport fun x => ‖f x‖) ↔ HasCompactSupport f :=
hasCompactSupport_comp_left norm_eq_zero
alias ⟨_, HasCompactSupport.norm⟩ := hasCompactSupport_norm_iff
end NormedAddGroup
lemma tendsto_norm_atTop_atTop : Tendsto (norm : ℝ → ℝ) atTop atTop := tendsto_abs_atTop_atTop
/-! ### `positivity` extensions -/
namespace Mathlib.Meta.Positivity
open Lean Meta Qq Function
/-- Extension for the `positivity` tactic: multiplicative norms are always nonnegative, and positive
| on non-one inputs. -/
@[positivity ‖_‖]
| Mathlib/Analysis/Normed/Group/Basic.lean | 1,327 | 1,328 |
/-
Copyright (c) 2019 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes
-/
import Mathlib.Algebra.BigOperators.Intervals
import Mathlib.Algebra.GeomSum
import Mathlib.Algebra.Order.Ring.Abs
import Mathlib.Data.Nat.Log
import Mathlib.Data.Nat.Prime.Defs
import Mathlib.Data.Nat.Digits
import Mathlib.RingTheory.Multiplicity
/-!
# Natural number multiplicity
This file contains lemmas about the multiplicity function (the maximum prime power dividing a
number) when applied to naturals, in particular calculating it for factorials and binomial
coefficients.
## Multiplicity calculations
* `Nat.Prime.multiplicity_factorial`: Legendre's Theorem. The multiplicity of `p` in `n!` is
`n / p + ... + n / p ^ b` for any `b` such that `n / p ^ (b + 1) = 0`. See `padicValNat_factorial`
for this result stated in the language of `p`-adic valuations and
`sub_one_mul_padicValNat_factorial` for a related result.
* `Nat.Prime.multiplicity_factorial_mul`: The multiplicity of `p` in `(p * n)!` is `n` more than
that of `n!`.
* `Nat.Prime.multiplicity_choose`: Kummer's Theorem. The multiplicity of `p` in `n.choose k` is the
number of carries when `k` and `n - k` are added in base `p`. See `padicValNat_choose` for the
same result but stated in the language of `p`-adic valuations and
`sub_one_mul_padicValNat_choose_eq_sub_sum_digits` for a related result.
## Other declarations
* `Nat.multiplicity_eq_card_pow_dvd`: The multiplicity of `m` in `n` is the number of positive
natural numbers `i` such that `m ^ i` divides `n`.
* `Nat.multiplicity_two_factorial_lt`: The multiplicity of `2` in `n!` is strictly less than `n`.
* `Nat.Prime.multiplicity_something`: Specialization of `multiplicity.something` to a prime in the
naturals. Avoids having to provide `p ≠ 1` and other trivialities, along with translating between
`Prime` and `Nat.Prime`.
## Tags
Legendre, p-adic
-/
open Finset Nat
open Nat
namespace Nat
/-- The multiplicity of `m` in `n` is the number of positive natural numbers `i` such that `m ^ i`
divides `n`. This set is expressed by filtering `Ico 1 b` where `b` is any bound greater than
`log m n`. -/
theorem emultiplicity_eq_card_pow_dvd {m n b : ℕ} (hm : m ≠ 1) (hn : 0 < n) (hb : log m n < b) :
emultiplicity m n = #{i ∈ Ico 1 b | m ^ i ∣ n} :=
have fin := Nat.finiteMultiplicity_iff.2 ⟨hm, hn⟩
calc
emultiplicity m n = #(Ico 1 <| multiplicity m n + 1) := by
simp [fin.emultiplicity_eq_multiplicity]
_ = #{i ∈ Ico 1 b | m ^ i ∣ n} :=
congr_arg _ <|
congr_arg card <|
Finset.ext fun i => by
simp only [mem_Ico, Nat.lt_succ_iff,
fin.pow_dvd_iff_le_multiplicity, mem_filter,
and_assoc, and_congr_right_iff, iff_and_self]
intro hi h
rw [← fin.pow_dvd_iff_le_multiplicity] at h
rcases m with - | m
· rw [zero_pow, zero_dvd_iff] at h
exacts [(hn.ne' h).elim, one_le_iff_ne_zero.1 hi]
refine LE.le.trans_lt ?_ hb
exact le_log_of_pow_le (one_lt_iff_ne_zero_and_ne_one.2 ⟨m.succ_ne_zero, hm⟩)
(le_of_dvd hn h)
namespace Prime
theorem emultiplicity_one {p : ℕ} (hp : p.Prime) : emultiplicity p 1 = 0 :=
emultiplicity_of_one_right hp.prime.not_unit
theorem emultiplicity_mul {p m n : ℕ} (hp : p.Prime) :
emultiplicity p (m * n) = emultiplicity p m + emultiplicity p n :=
_root_.emultiplicity_mul hp.prime
theorem emultiplicity_pow {p m n : ℕ} (hp : p.Prime) :
emultiplicity p (m ^ n) = n * emultiplicity p m :=
_root_.emultiplicity_pow hp.prime
theorem emultiplicity_self {p : ℕ} (hp : p.Prime) : emultiplicity p p = 1 :=
(Nat.finiteMultiplicity_iff.2 ⟨hp.ne_one, hp.pos⟩).emultiplicity_self
theorem emultiplicity_pow_self {p n : ℕ} (hp : p.Prime) : emultiplicity p (p ^ n) = n :=
_root_.emultiplicity_pow_self hp.ne_zero hp.prime.not_unit n
/-- **Legendre's Theorem**
The multiplicity of a prime in `n!` is the sum of the quotients `n / p ^ i`. This sum is expressed
over the finset `Ico 1 b` where `b` is any bound greater than `log p n`. -/
theorem emultiplicity_factorial {p : ℕ} (hp : p.Prime) :
∀ {n b : ℕ}, log p n < b → emultiplicity p n ! = (∑ i ∈ Ico 1 b, n / p ^ i : ℕ)
| 0, b, _ => by simp [Ico, hp.emultiplicity_one]
| n + 1, b, hb =>
calc
| emultiplicity p (n + 1)! = emultiplicity p n ! + emultiplicity p (n + 1) := by
rw [factorial_succ, hp.emultiplicity_mul, add_comm]
_ = (∑ i ∈ Ico 1 b, n / p ^ i : ℕ) + #{i ∈ Ico 1 b | p ^ i ∣ n + 1} := by
rw [emultiplicity_factorial hp ((log_mono_right <| le_succ _).trans_lt hb), ←
emultiplicity_eq_card_pow_dvd hp.ne_one (succ_pos _) hb]
_ = (∑ i ∈ Ico 1 b, (n / p ^ i + if p ^ i ∣ n + 1 then 1 else 0) : ℕ) := by
rw [sum_add_distrib, sum_boole]
simp
_ = (∑ i ∈ Ico 1 b, (n + 1) / p ^ i : ℕ) :=
congr_arg _ <| Finset.sum_congr rfl fun _ _ => Nat.succ_div.symm
/-- For a prime number `p`, taking `(p - 1)` times the multiplicity of `p` in `n!` equals `n` minus
the sum of base `p` digits of `n`. -/
theorem sub_one_mul_multiplicity_factorial {n p : ℕ} (hp : p.Prime) :
(p - 1) * multiplicity p n ! =
n - (p.digits n).sum := by
| Mathlib/Data/Nat/Multiplicity.lean | 108 | 123 |
/-
Copyright (c) 2019 Kim Morrison. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Kim Morrison, Yaël Dillies
-/
import Mathlib.Order.Cover
import Mathlib.Order.Interval.Finset.Defs
/-!
# Intervals as finsets
This file provides basic results about all the `Finset.Ixx`, which are defined in
`Order.Interval.Finset.Defs`.
In addition, it shows that in a locally finite order `≤` and `<` are the transitive closures of,
respectively, `⩿` and `⋖`, which then leads to a characterization of monotone and strictly
functions whose domain is a locally finite order. In particular, this file proves:
* `le_iff_transGen_wcovBy`: `≤` is the transitive closure of `⩿`
* `lt_iff_transGen_covBy`: `<` is the transitive closure of `⋖`
* `monotone_iff_forall_wcovBy`: Characterization of monotone functions
* `strictMono_iff_forall_covBy`: Characterization of strictly monotone functions
## TODO
This file was originally only about `Finset.Ico a b` where `a b : ℕ`. No care has yet been taken to
generalize these lemmas properly and many lemmas about `Icc`, `Ioc`, `Ioo` are missing. In general,
what's to do is taking the lemmas in `Data.X.Intervals` and abstract away the concrete structure.
Complete the API. See
https://github.com/leanprover-community/mathlib/pull/14448#discussion_r906109235
for some ideas.
-/
assert_not_exists MonoidWithZero Finset.sum
open Function OrderDual
open FinsetInterval
variable {ι α : Type*} {a a₁ a₂ b b₁ b₂ c x : α}
namespace Finset
section Preorder
variable [Preorder α]
section LocallyFiniteOrder
variable [LocallyFiniteOrder α]
@[simp]
theorem nonempty_Icc : (Icc a b).Nonempty ↔ a ≤ b := by
rw [← coe_nonempty, coe_Icc, Set.nonempty_Icc]
@[aesop safe apply (rule_sets := [finsetNonempty])]
alias ⟨_, Aesop.nonempty_Icc_of_le⟩ := nonempty_Icc
@[simp]
theorem nonempty_Ico : (Ico a b).Nonempty ↔ a < b := by
rw [← coe_nonempty, coe_Ico, Set.nonempty_Ico]
@[aesop safe apply (rule_sets := [finsetNonempty])]
alias ⟨_, Aesop.nonempty_Ico_of_lt⟩ := nonempty_Ico
@[simp]
theorem nonempty_Ioc : (Ioc a b).Nonempty ↔ a < b := by
rw [← coe_nonempty, coe_Ioc, Set.nonempty_Ioc]
@[aesop safe apply (rule_sets := [finsetNonempty])]
alias ⟨_, Aesop.nonempty_Ioc_of_lt⟩ := nonempty_Ioc
-- TODO: This is nonsense. A locally finite order is never densely ordered
@[simp]
theorem nonempty_Ioo [DenselyOrdered α] : (Ioo a b).Nonempty ↔ a < b := by
rw [← coe_nonempty, coe_Ioo, Set.nonempty_Ioo]
@[simp]
theorem Icc_eq_empty_iff : Icc a b = ∅ ↔ ¬a ≤ b := by
rw [← coe_eq_empty, coe_Icc, Set.Icc_eq_empty_iff]
@[simp]
theorem Ico_eq_empty_iff : Ico a b = ∅ ↔ ¬a < b := by
rw [← coe_eq_empty, coe_Ico, Set.Ico_eq_empty_iff]
@[simp]
theorem Ioc_eq_empty_iff : Ioc a b = ∅ ↔ ¬a < b := by
rw [← coe_eq_empty, coe_Ioc, Set.Ioc_eq_empty_iff]
-- TODO: This is nonsense. A locally finite order is never densely ordered
@[simp]
theorem Ioo_eq_empty_iff [DenselyOrdered α] : Ioo a b = ∅ ↔ ¬a < b := by
rw [← coe_eq_empty, coe_Ioo, Set.Ioo_eq_empty_iff]
alias ⟨_, Icc_eq_empty⟩ := Icc_eq_empty_iff
alias ⟨_, Ico_eq_empty⟩ := Ico_eq_empty_iff
alias ⟨_, Ioc_eq_empty⟩ := Ioc_eq_empty_iff
@[simp]
theorem Ioo_eq_empty (h : ¬a < b) : Ioo a b = ∅ :=
eq_empty_iff_forall_not_mem.2 fun _ hx => h ((mem_Ioo.1 hx).1.trans (mem_Ioo.1 hx).2)
@[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 left_mem_Icc : a ∈ Icc a b ↔ a ≤ b := by simp only [mem_Icc, true_and, le_rfl]
theorem left_mem_Ico : a ∈ Ico a b ↔ a < b := by simp only [mem_Ico, true_and, le_refl]
theorem right_mem_Icc : b ∈ Icc a b ↔ a ≤ b := by simp only [mem_Icc, and_true, le_rfl]
theorem right_mem_Ioc : b ∈ Ioc a b ↔ a < b := by simp only [mem_Ioc, and_true, le_rfl]
theorem left_not_mem_Ioc : a ∉ Ioc a b := fun h => lt_irrefl _ (mem_Ioc.1 h).1
theorem left_not_mem_Ioo : a ∉ Ioo a b := fun h => lt_irrefl _ (mem_Ioo.1 h).1
theorem right_not_mem_Ico : b ∉ Ico a b := fun h => lt_irrefl _ (mem_Ico.1 h).2
theorem right_not_mem_Ioo : b ∉ Ioo a b := fun h => lt_irrefl _ (mem_Ioo.1 h).2
@[gcongr]
theorem Icc_subset_Icc (ha : a₂ ≤ a₁) (hb : b₁ ≤ b₂) : Icc a₁ b₁ ⊆ Icc a₂ b₂ := by
simpa [← coe_subset] using Set.Icc_subset_Icc ha hb
@[gcongr]
theorem Ico_subset_Ico (ha : a₂ ≤ a₁) (hb : b₁ ≤ b₂) : Ico a₁ b₁ ⊆ Ico a₂ b₂ := by
simpa [← coe_subset] using Set.Ico_subset_Ico ha hb
@[gcongr]
theorem Ioc_subset_Ioc (ha : a₂ ≤ a₁) (hb : b₁ ≤ b₂) : Ioc a₁ b₁ ⊆ Ioc a₂ b₂ := by
simpa [← coe_subset] using Set.Ioc_subset_Ioc ha hb
@[gcongr]
theorem Ioo_subset_Ioo (ha : a₂ ≤ a₁) (hb : b₁ ≤ b₂) : Ioo a₁ b₁ ⊆ Ioo a₂ b₂ := by
simpa [← coe_subset] using Set.Ioo_subset_Ioo ha hb
@[gcongr]
theorem Icc_subset_Icc_left (h : a₁ ≤ a₂) : Icc a₂ b ⊆ Icc a₁ b :=
Icc_subset_Icc h le_rfl
@[gcongr]
theorem Ico_subset_Ico_left (h : a₁ ≤ a₂) : Ico a₂ b ⊆ Ico a₁ b :=
Ico_subset_Ico h le_rfl
@[gcongr]
theorem Ioc_subset_Ioc_left (h : a₁ ≤ a₂) : Ioc a₂ b ⊆ Ioc a₁ b :=
Ioc_subset_Ioc h le_rfl
@[gcongr]
theorem Ioo_subset_Ioo_left (h : a₁ ≤ a₂) : Ioo a₂ b ⊆ Ioo a₁ b :=
Ioo_subset_Ioo h le_rfl
@[gcongr]
theorem Icc_subset_Icc_right (h : b₁ ≤ b₂) : Icc a b₁ ⊆ Icc a b₂ :=
Icc_subset_Icc le_rfl h
@[gcongr]
theorem Ico_subset_Ico_right (h : b₁ ≤ b₂) : Ico a b₁ ⊆ Ico a b₂ :=
Ico_subset_Ico le_rfl h
@[gcongr]
theorem Ioc_subset_Ioc_right (h : b₁ ≤ b₂) : Ioc a b₁ ⊆ Ioc a b₂ :=
Ioc_subset_Ioc le_rfl h
@[gcongr]
theorem Ioo_subset_Ioo_right (h : b₁ ≤ b₂) : Ioo a b₁ ⊆ Ioo a b₂ :=
Ioo_subset_Ioo le_rfl h
theorem Ico_subset_Ioo_left (h : a₁ < a₂) : Ico a₂ b ⊆ Ioo a₁ b := by
rw [← coe_subset, coe_Ico, coe_Ioo]
exact Set.Ico_subset_Ioo_left h
theorem Ioc_subset_Ioo_right (h : b₁ < b₂) : Ioc a b₁ ⊆ Ioo a b₂ := by
rw [← coe_subset, coe_Ioc, coe_Ioo]
exact Set.Ioc_subset_Ioo_right h
theorem Icc_subset_Ico_right (h : b₁ < b₂) : Icc a b₁ ⊆ Ico a b₂ := by
rw [← coe_subset, coe_Icc, coe_Ico]
exact Set.Icc_subset_Ico_right h
theorem Ioo_subset_Ico_self : Ioo a b ⊆ Ico a b := by
rw [← coe_subset, coe_Ioo, coe_Ico]
exact Set.Ioo_subset_Ico_self
theorem Ioo_subset_Ioc_self : Ioo a b ⊆ Ioc a b := by
rw [← coe_subset, coe_Ioo, coe_Ioc]
exact Set.Ioo_subset_Ioc_self
theorem Ico_subset_Icc_self : Ico a b ⊆ Icc a b := by
rw [← coe_subset, coe_Ico, coe_Icc]
exact Set.Ico_subset_Icc_self
theorem Ioc_subset_Icc_self : Ioc a b ⊆ Icc a b := by
rw [← coe_subset, coe_Ioc, coe_Icc]
exact Set.Ioc_subset_Icc_self
theorem Ioo_subset_Icc_self : Ioo a b ⊆ Icc a b :=
Ioo_subset_Ico_self.trans Ico_subset_Icc_self
theorem Icc_subset_Icc_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Icc a₂ b₂ ↔ a₂ ≤ a₁ ∧ b₁ ≤ b₂ := by
rw [← coe_subset, coe_Icc, coe_Icc, Set.Icc_subset_Icc_iff h₁]
theorem Icc_subset_Ioo_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Ioo a₂ b₂ ↔ a₂ < a₁ ∧ b₁ < b₂ := by
rw [← coe_subset, coe_Icc, coe_Ioo, Set.Icc_subset_Ioo_iff h₁]
theorem Icc_subset_Ico_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Ico a₂ b₂ ↔ a₂ ≤ a₁ ∧ b₁ < b₂ := by
rw [← coe_subset, coe_Icc, coe_Ico, Set.Icc_subset_Ico_iff h₁]
theorem Icc_subset_Ioc_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Ioc a₂ b₂ ↔ a₂ < a₁ ∧ b₁ ≤ b₂ :=
(Icc_subset_Ico_iff h₁.dual).trans and_comm
--TODO: `Ico_subset_Ioo_iff`, `Ioc_subset_Ioo_iff`
theorem Icc_ssubset_Icc_left (hI : a₂ ≤ b₂) (ha : a₂ < a₁) (hb : b₁ ≤ b₂) :
Icc a₁ b₁ ⊂ Icc a₂ b₂ := by
rw [← coe_ssubset, coe_Icc, coe_Icc]
exact Set.Icc_ssubset_Icc_left hI ha hb
theorem Icc_ssubset_Icc_right (hI : a₂ ≤ b₂) (ha : a₂ ≤ a₁) (hb : b₁ < b₂) :
Icc a₁ b₁ ⊂ Icc a₂ b₂ := by
rw [← coe_ssubset, coe_Icc, coe_Icc]
exact Set.Icc_ssubset_Icc_right hI ha hb
@[simp]
theorem Ioc_disjoint_Ioc_of_le {d : α} (hbc : b ≤ c) : Disjoint (Ioc a b) (Ioc c d) :=
disjoint_left.2 fun _ h1 h2 ↦ not_and_of_not_left _
((mem_Ioc.1 h1).2.trans hbc).not_lt (mem_Ioc.1 h2)
variable (a)
theorem Ico_self : Ico a a = ∅ :=
Ico_eq_empty <| lt_irrefl _
theorem Ioc_self : Ioc a a = ∅ :=
Ioc_eq_empty <| lt_irrefl _
theorem Ioo_self : Ioo a a = ∅ :=
Ioo_eq_empty <| lt_irrefl _
variable {a}
/-- A set with upper and lower bounds in a locally finite order is a fintype -/
def _root_.Set.fintypeOfMemBounds {s : Set α} [DecidablePred (· ∈ s)] (ha : a ∈ lowerBounds s)
(hb : b ∈ upperBounds s) : Fintype s :=
Set.fintypeSubset (Set.Icc a b) fun _ hx => ⟨ha hx, hb hx⟩
section Filter
theorem Ico_filter_lt_of_le_left [DecidablePred (· < c)] (hca : c ≤ a) :
{x ∈ Ico a b | x < c} = ∅ :=
filter_false_of_mem fun _ hx => (hca.trans (mem_Ico.1 hx).1).not_lt
theorem Ico_filter_lt_of_right_le [DecidablePred (· < c)] (hbc : b ≤ c) :
{x ∈ Ico a b | x < c} = Ico a b :=
filter_true_of_mem fun _ hx => (mem_Ico.1 hx).2.trans_le hbc
theorem Ico_filter_lt_of_le_right [DecidablePred (· < c)] (hcb : c ≤ b) :
{x ∈ Ico a b | x < c} = Ico a c := by
ext x
rw [mem_filter, mem_Ico, mem_Ico, and_right_comm]
exact and_iff_left_of_imp fun h => h.2.trans_le hcb
theorem Ico_filter_le_of_le_left {a b c : α} [DecidablePred (c ≤ ·)] (hca : c ≤ a) :
{x ∈ Ico a b | c ≤ x} = Ico a b :=
filter_true_of_mem fun _ hx => hca.trans (mem_Ico.1 hx).1
theorem Ico_filter_le_of_right_le {a b : α} [DecidablePred (b ≤ ·)] :
{x ∈ Ico a b | b ≤ x} = ∅ :=
filter_false_of_mem fun _ hx => (mem_Ico.1 hx).2.not_le
theorem Ico_filter_le_of_left_le {a b c : α} [DecidablePred (c ≤ ·)] (hac : a ≤ c) :
{x ∈ Ico a b | c ≤ x} = Ico c b := by
ext x
rw [mem_filter, mem_Ico, mem_Ico, and_comm, and_left_comm]
exact and_iff_right_of_imp fun h => hac.trans h.1
theorem Icc_filter_lt_of_lt_right {a b c : α} [DecidablePred (· < c)] (h : b < c) :
{x ∈ Icc a b | x < c} = Icc a b :=
filter_true_of_mem fun _ hx => lt_of_le_of_lt (mem_Icc.1 hx).2 h
theorem Ioc_filter_lt_of_lt_right {a b c : α} [DecidablePred (· < c)] (h : b < c) :
{x ∈ Ioc a b | x < c} = Ioc a b :=
filter_true_of_mem fun _ hx => lt_of_le_of_lt (mem_Ioc.1 hx).2 h
theorem Iic_filter_lt_of_lt_right {α} [Preorder α] [LocallyFiniteOrderBot α] {a c : α}
[DecidablePred (· < c)] (h : a < c) : {x ∈ Iic a | x < c} = Iic a :=
filter_true_of_mem fun _ hx => lt_of_le_of_lt (mem_Iic.1 hx) h
variable (a b) [Fintype α]
theorem filter_lt_lt_eq_Ioo [DecidablePred fun j => a < j ∧ j < b] :
({j | a < j ∧ j < b} : Finset _) = Ioo a b := by ext; simp
theorem filter_lt_le_eq_Ioc [DecidablePred fun j => a < j ∧ j ≤ b] :
({j | a < j ∧ j ≤ b} : Finset _) = Ioc a b := by ext; simp
theorem filter_le_lt_eq_Ico [DecidablePred fun j => a ≤ j ∧ j < b] :
({j | a ≤ j ∧ j < b} : Finset _) = Ico a b := by ext; simp
theorem filter_le_le_eq_Icc [DecidablePred fun j => a ≤ j ∧ j ≤ b] :
({j | a ≤ j ∧ j ≤ b} : Finset _) = Icc a b := by ext; simp
end Filter
end LocallyFiniteOrder
section LocallyFiniteOrderTop
variable [LocallyFiniteOrderTop α]
@[simp]
theorem Ioi_eq_empty : Ioi a = ∅ ↔ IsMax a := by
rw [← coe_eq_empty, coe_Ioi, Set.Ioi_eq_empty_iff]
@[simp] alias ⟨_, _root_.IsMax.finsetIoi_eq⟩ := Ioi_eq_empty
@[simp] lemma Ioi_nonempty : (Ioi a).Nonempty ↔ ¬ IsMax a := by simp [nonempty_iff_ne_empty]
theorem Ioi_top [OrderTop α] : Ioi (⊤ : α) = ∅ := Ioi_eq_empty.mpr isMax_top
@[simp]
theorem Ici_bot [OrderBot α] [Fintype α] : Ici (⊥ : α) = univ := by
ext a; simp only [mem_Ici, bot_le, mem_univ]
@[simp, aesop safe apply (rule_sets := [finsetNonempty])]
lemma nonempty_Ici : (Ici a).Nonempty := ⟨a, mem_Ici.2 le_rfl⟩
lemma nonempty_Ioi : (Ioi a).Nonempty ↔ ¬ IsMax a := by simp [Finset.Nonempty]
@[aesop safe apply (rule_sets := [finsetNonempty])]
alias ⟨_, Aesop.nonempty_Ioi_of_not_isMax⟩ := nonempty_Ioi
@[simp]
theorem Ici_subset_Ici : Ici a ⊆ Ici b ↔ b ≤ a := by
simp [← coe_subset]
@[gcongr]
alias ⟨_, _root_.GCongr.Finset.Ici_subset_Ici⟩ := Ici_subset_Ici
@[simp]
theorem Ici_ssubset_Ici : Ici a ⊂ Ici b ↔ b < a := by
simp [← coe_ssubset]
@[gcongr]
alias ⟨_, _root_.GCongr.Finset.Ici_ssubset_Ici⟩ := Ici_ssubset_Ici
@[gcongr]
theorem Ioi_subset_Ioi (h : a ≤ b) : Ioi b ⊆ Ioi a := by
simpa [← coe_subset] using Set.Ioi_subset_Ioi h
@[gcongr]
theorem Ioi_ssubset_Ioi (h : a < b) : Ioi b ⊂ Ioi a := by
simpa [← coe_ssubset] using Set.Ioi_ssubset_Ioi h
variable [LocallyFiniteOrder α]
theorem Icc_subset_Ici_self : Icc a b ⊆ Ici a := by
simpa [← coe_subset] using Set.Icc_subset_Ici_self
theorem Ico_subset_Ici_self : Ico a b ⊆ Ici a := by
simpa [← coe_subset] using Set.Ico_subset_Ici_self
theorem Ioc_subset_Ioi_self : Ioc a b ⊆ Ioi a := by
simpa [← coe_subset] using Set.Ioc_subset_Ioi_self
theorem Ioo_subset_Ioi_self : Ioo a b ⊆ Ioi a := by
simpa [← coe_subset] using Set.Ioo_subset_Ioi_self
theorem Ioc_subset_Ici_self : Ioc a b ⊆ Ici a :=
Ioc_subset_Icc_self.trans Icc_subset_Ici_self
theorem Ioo_subset_Ici_self : Ioo a b ⊆ Ici a :=
Ioo_subset_Ico_self.trans Ico_subset_Ici_self
end LocallyFiniteOrderTop
section LocallyFiniteOrderBot
variable [LocallyFiniteOrderBot α]
@[simp]
theorem Iio_eq_empty : Iio a = ∅ ↔ IsMin a := Ioi_eq_empty (α := αᵒᵈ)
@[simp] alias ⟨_, _root_.IsMin.finsetIio_eq⟩ := Iio_eq_empty
@[simp] lemma Iio_nonempty : (Iio a).Nonempty ↔ ¬ IsMin a := by simp [nonempty_iff_ne_empty]
theorem Iio_bot [OrderBot α] : Iio (⊥ : α) = ∅ := Iio_eq_empty.mpr isMin_bot
@[simp]
theorem Iic_top [OrderTop α] [Fintype α] : Iic (⊤ : α) = univ := by
ext a; simp only [mem_Iic, le_top, mem_univ]
@[simp, aesop safe apply (rule_sets := [finsetNonempty])]
lemma nonempty_Iic : (Iic a).Nonempty := ⟨a, mem_Iic.2 le_rfl⟩
lemma nonempty_Iio : (Iio a).Nonempty ↔ ¬ IsMin a := by simp [Finset.Nonempty]
@[aesop safe apply (rule_sets := [finsetNonempty])]
alias ⟨_, Aesop.nonempty_Iio_of_not_isMin⟩ := nonempty_Iio
@[simp]
theorem Iic_subset_Iic : Iic a ⊆ Iic b ↔ a ≤ b := by
simp [← coe_subset]
@[gcongr]
alias ⟨_, _root_.GCongr.Finset.Iic_subset_Iic⟩ := Iic_subset_Iic
@[simp]
theorem Iic_ssubset_Iic : Iic a ⊂ Iic b ↔ a < b := by
simp [← coe_ssubset]
@[gcongr]
alias ⟨_, _root_.GCongr.Finset.Iic_ssubset_Iic⟩ := Iic_ssubset_Iic
@[gcongr]
theorem Iio_subset_Iio (h : a ≤ b) : Iio a ⊆ Iio b := by
simpa [← coe_subset] using Set.Iio_subset_Iio h
@[gcongr]
theorem Iio_ssubset_Iio (h : a < b) : Iio a ⊂ Iio b := by
simpa [← coe_ssubset] using Set.Iio_ssubset_Iio h
variable [LocallyFiniteOrder α]
theorem Icc_subset_Iic_self : Icc a b ⊆ Iic b := by
simpa [← coe_subset] using Set.Icc_subset_Iic_self
theorem Ioc_subset_Iic_self : Ioc a b ⊆ Iic b := by
simpa [← coe_subset] using Set.Ioc_subset_Iic_self
theorem Ico_subset_Iio_self : Ico a b ⊆ Iio b := by
simpa [← coe_subset] using Set.Ico_subset_Iio_self
theorem Ioo_subset_Iio_self : Ioo a b ⊆ Iio b := by
simpa [← coe_subset] using Set.Ioo_subset_Iio_self
theorem Ico_subset_Iic_self : Ico a b ⊆ Iic b :=
Ico_subset_Icc_self.trans Icc_subset_Iic_self
theorem Ioo_subset_Iic_self : Ioo a b ⊆ Iic b :=
Ioo_subset_Ioc_self.trans Ioc_subset_Iic_self
theorem Iic_disjoint_Ioc (h : a ≤ b) : Disjoint (Iic a) (Ioc b c) :=
disjoint_left.2 fun _ hax hbcx ↦ (mem_Iic.1 hax).not_lt <| lt_of_le_of_lt h (mem_Ioc.1 hbcx).1
/-- An equivalence between `Finset.Iic a` and `Set.Iic a`. -/
def _root_.Equiv.IicFinsetSet (a : α) : Iic a ≃ Set.Iic a where
toFun b := ⟨b.1, coe_Iic a ▸ mem_coe.2 b.2⟩
invFun b := ⟨b.1, by rw [← mem_coe, coe_Iic a]; exact b.2⟩
left_inv := fun _ ↦ rfl
right_inv := fun _ ↦ rfl
end LocallyFiniteOrderBot
section LocallyFiniteOrderTop
variable [LocallyFiniteOrderTop α] {a : α}
theorem Ioi_subset_Ici_self : Ioi a ⊆ Ici a := by
simpa [← coe_subset] using Set.Ioi_subset_Ici_self
theorem _root_.BddBelow.finite {s : Set α} (hs : BddBelow s) : s.Finite :=
let ⟨a, ha⟩ := hs
(Ici a).finite_toSet.subset fun _ hx => mem_Ici.2 <| ha hx
theorem _root_.Set.Infinite.not_bddBelow {s : Set α} : s.Infinite → ¬BddBelow s :=
mt BddBelow.finite
variable [Fintype α]
theorem filter_lt_eq_Ioi [DecidablePred (a < ·)] : ({x | a < x} : Finset _) = Ioi a := by ext; simp
theorem filter_le_eq_Ici [DecidablePred (a ≤ ·)] : ({x | a ≤ x} : Finset _) = Ici a := by ext; simp
| end LocallyFiniteOrderTop
section LocallyFiniteOrderBot
| Mathlib/Order/Interval/Finset/Basic.lean | 489 | 491 |
/-
Copyright (c) 2021 Yakov Pechersky. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Yakov Pechersky
-/
import Mathlib.Algebra.BigOperators.Group.Finset.Basic
import Mathlib.Algebra.Group.Commute.Hom
import Mathlib.Algebra.Group.Pi.Lemmas
import Mathlib.Data.Fintype.Basic
/-!
# Products (respectively, sums) over a finset or a multiset.
The regular `Finset.prod` and `Multiset.prod` require `[CommMonoid α]`.
Often, there are collections `s : Finset α` where `[Monoid α]` and we know,
in a dependent fashion, that for all the terms `∀ (x ∈ s) (y ∈ s), Commute x y`.
This allows to still have a well-defined product over `s`.
## Main definitions
- `Finset.noncommProd`, requiring a proof of commutativity of held terms
- `Multiset.noncommProd`, requiring a proof of commutativity of held terms
## Implementation details
While `List.prod` is defined via `List.foldl`, `noncommProd` is defined via
`Multiset.foldr` for neater proofs and definitions. By the commutativity assumption,
the two must be equal.
TODO: Tidy up this file by using the fact that the submonoid generated by commuting
elements is commutative and using the `Finset.prod` versions of lemmas to prove the `noncommProd`
version.
-/
variable {F ι α β γ : Type*} (f : α → β → β) (op : α → α → α)
namespace Multiset
/-- Fold of a `s : Multiset α` with `f : α → β → β`, given a proof that `LeftCommutative f`
on all elements `x ∈ s`. -/
def noncommFoldr (s : Multiset α)
(comm : { x | x ∈ s }.Pairwise fun x y => ∀ b, f x (f y b) = f y (f x b)) (b : β) : β :=
letI : LeftCommutative (α := { x // x ∈ s }) (f ∘ Subtype.val) :=
⟨fun ⟨_, hx⟩ ⟨_, hy⟩ =>
haveI : IsRefl α fun x y => ∀ b, f x (f y b) = f y (f x b) := ⟨fun _ _ => rfl⟩
comm.of_refl hx hy⟩
s.attach.foldr (f ∘ Subtype.val) b
@[simp]
theorem noncommFoldr_coe (l : List α) (comm) (b : β) :
noncommFoldr f (l : Multiset α) comm b = l.foldr f b := by
simp only [noncommFoldr, coe_foldr, coe_attach, List.attach, List.attachWith, Function.comp_def]
rw [← List.foldr_map]
simp [List.map_pmap]
@[simp]
theorem noncommFoldr_empty (h) (b : β) : noncommFoldr f (0 : Multiset α) h b = b :=
rfl
theorem noncommFoldr_cons (s : Multiset α) (a : α) (h h') (b : β) :
noncommFoldr f (a ::ₘ s) h b = f a (noncommFoldr f s h' b) := by
induction s using Quotient.inductionOn
simp
theorem noncommFoldr_eq_foldr (s : Multiset α) [h : LeftCommutative f] (b : β) :
noncommFoldr f s (fun x _ y _ _ => h.left_comm x y) b = foldr f b s := by
induction s using Quotient.inductionOn
simp
section assoc
variable [assoc : Std.Associative op]
/-- Fold of a `s : Multiset α` with an associative `op : α → α → α`, given a proofs that `op`
is commutative on all elements `x ∈ s`. -/
def noncommFold (s : Multiset α) (comm : { x | x ∈ s }.Pairwise fun x y => op x y = op y x) :
α → α :=
noncommFoldr op s fun x hx y hy h b => by rw [← assoc.assoc, comm hx hy h, assoc.assoc]
@[simp]
theorem noncommFold_coe (l : List α) (comm) (a : α) :
noncommFold op (l : Multiset α) comm a = l.foldr op a := by simp [noncommFold]
@[simp]
theorem noncommFold_empty (h) (a : α) : noncommFold op (0 : Multiset α) h a = a :=
rfl
theorem noncommFold_cons (s : Multiset α) (a : α) (h h') (x : α) :
noncommFold op (a ::ₘ s) h x = op a (noncommFold op s h' x) := by
induction s using Quotient.inductionOn
simp
theorem noncommFold_eq_fold (s : Multiset α) [Std.Commutative op] (a : α) :
noncommFold op s (fun x _ y _ _ => Std.Commutative.comm x y) a = fold op a s := by
induction s using Quotient.inductionOn
simp
end assoc
variable [Monoid α] [Monoid β]
/-- Product of a `s : Multiset α` with `[Monoid α]`, given a proof that `*` commutes
on all elements `x ∈ s`. -/
@[to_additive
"Sum of a `s : Multiset α` with `[AddMonoid α]`, given a proof that `+` commutes
on all elements `x ∈ s`."]
def noncommProd (s : Multiset α) (comm : { x | x ∈ s }.Pairwise Commute) : α :=
s.noncommFold (· * ·) comm 1
@[to_additive (attr := simp)]
theorem noncommProd_coe (l : List α) (comm) : noncommProd (l : Multiset α) comm = l.prod := by
rw [noncommProd]
simp only [noncommFold_coe]
induction' l with hd tl hl
· simp
· rw [List.prod_cons, List.foldr, hl]
intro x hx y hy
exact comm (List.mem_cons_of_mem _ hx) (List.mem_cons_of_mem _ hy)
@[to_additive (attr := simp)]
theorem noncommProd_empty (h) : noncommProd (0 : Multiset α) h = 1 :=
rfl
@[to_additive (attr := simp)]
theorem noncommProd_cons (s : Multiset α) (a : α) (comm) :
noncommProd (a ::ₘ s) comm = a * noncommProd s (comm.mono fun _ => mem_cons_of_mem) := by
induction s using Quotient.inductionOn
simp
@[to_additive]
theorem noncommProd_cons' (s : Multiset α) (a : α) (comm) :
noncommProd (a ::ₘ s) comm = noncommProd s (comm.mono fun _ => mem_cons_of_mem) * a := by
induction' s using Quotient.inductionOn with s
simp only [quot_mk_to_coe, cons_coe, noncommProd_coe, List.prod_cons]
induction' s with hd tl IH
· simp
· rw [List.prod_cons, mul_assoc, ← IH, ← mul_assoc, ← mul_assoc]
· congr 1
apply comm.of_refl <;> simp
· intro x hx y hy
simp only [quot_mk_to_coe, List.mem_cons, mem_coe, cons_coe] at hx hy
apply comm
· cases hx <;> simp [*]
· cases hy <;> simp [*]
@[to_additive]
theorem noncommProd_add (s t : Multiset α) (comm) :
noncommProd (s + t) comm =
noncommProd s (comm.mono <| subset_of_le <| s.le_add_right t) *
noncommProd t (comm.mono <| subset_of_le <| t.le_add_left s) := by
rcases s with ⟨⟩
rcases t with ⟨⟩
simp
@[to_additive]
lemma noncommProd_induction (s : Multiset α) (comm)
(p : α → Prop) (hom : ∀ a b, p a → p b → p (a * b)) (unit : p 1) (base : ∀ x ∈ s, p x) :
p (s.noncommProd comm) := by
induction' s using Quotient.inductionOn with l
simp only [quot_mk_to_coe, noncommProd_coe, mem_coe] at base ⊢
exact l.prod_induction p hom unit base
variable [FunLike F α β]
@[to_additive]
protected theorem map_noncommProd_aux [MulHomClass F α β] (s : Multiset α)
(comm : { x | x ∈ s }.Pairwise Commute) (f : F) : { x | x ∈ s.map f }.Pairwise Commute := by
simp only [Multiset.mem_map]
rintro _ ⟨x, hx, rfl⟩ _ ⟨y, hy, rfl⟩ _
exact (comm.of_refl hx hy).map f
@[to_additive]
theorem map_noncommProd [MonoidHomClass F α β] (s : Multiset α) (comm) (f : F) :
f (s.noncommProd comm) = (s.map f).noncommProd (Multiset.map_noncommProd_aux s comm f) := by
induction s using Quotient.inductionOn
simpa using map_list_prod f _
@[to_additive noncommSum_eq_card_nsmul]
theorem noncommProd_eq_pow_card (s : Multiset α) (comm) (m : α) (h : ∀ x ∈ s, x = m) :
s.noncommProd comm = m ^ Multiset.card s := by
induction s using Quotient.inductionOn
simp only [quot_mk_to_coe, noncommProd_coe, coe_card, mem_coe] at *
exact List.prod_eq_pow_card _ m h
@[to_additive]
theorem noncommProd_eq_prod {α : Type*} [CommMonoid α] (s : Multiset α) :
(noncommProd s fun _ _ _ _ _ => Commute.all _ _) = prod s := by
induction s using Quotient.inductionOn
simp
@[to_additive]
theorem noncommProd_commute (s : Multiset α) (comm) (y : α) (h : ∀ x ∈ s, Commute y x) :
Commute y (s.noncommProd comm) := by
induction s using Quotient.inductionOn
simp only [quot_mk_to_coe, noncommProd_coe]
exact Commute.list_prod_right _ _ h
theorem mul_noncommProd_erase [DecidableEq α] (s : Multiset α) {a : α} (h : a ∈ s) (comm)
(comm' := fun _ hx _ hy hxy ↦ comm (s.mem_of_mem_erase hx) (s.mem_of_mem_erase hy) hxy) :
a * (s.erase a).noncommProd comm' = s.noncommProd comm := by
induction' s using Quotient.inductionOn with l
simp only [quot_mk_to_coe, mem_coe, coe_erase, noncommProd_coe] at comm h ⊢
suffices ∀ x ∈ l, ∀ y ∈ l, x * y = y * x by rw [List.prod_erase_of_comm h this]
intro x hx y hy
rcases eq_or_ne x y with rfl | hxy
· rfl
exact comm hx hy hxy
theorem noncommProd_erase_mul [DecidableEq α] (s : Multiset α) {a : α} (h : a ∈ s) (comm)
(comm' := fun _ hx _ hy hxy ↦ comm (s.mem_of_mem_erase hx) (s.mem_of_mem_erase hy) hxy) :
(s.erase a).noncommProd comm' * a = s.noncommProd comm := by
suffices ∀ b ∈ erase s a, Commute a b by
rw [← (noncommProd_commute (s.erase a) comm' a this).eq, mul_noncommProd_erase s h comm comm']
intro b hb
rcases eq_or_ne a b with rfl | hab
· rfl
exact comm h (mem_of_mem_erase hb) hab
end Multiset
namespace Finset
variable [Monoid β] [Monoid γ]
open scoped Function -- required for scoped `on` notation
/-- Proof used in definition of `Finset.noncommProd` -/
@[to_additive]
theorem noncommProd_lemma (s : Finset α) (f : α → β)
(comm : (s : Set α).Pairwise (Commute on f)) :
Set.Pairwise { x | x ∈ Multiset.map f s.val } Commute := by
simp_rw [Multiset.mem_map]
rintro _ ⟨a, ha, rfl⟩ _ ⟨b, hb, rfl⟩ _
exact comm.of_refl ha hb
/-- Product of a `s : Finset α` mapped with `f : α → β` with `[Monoid β]`,
given a proof that `*` commutes on all elements `f x` for `x ∈ s`. -/
@[to_additive
"Sum of a `s : Finset α` mapped with `f : α → β` with `[AddMonoid β]`,
given a proof that `+` commutes on all elements `f x` for `x ∈ s`."]
def noncommProd (s : Finset α) (f : α → β)
(comm : (s : Set α).Pairwise (Commute on f)) : β :=
(s.1.map f).noncommProd <| noncommProd_lemma s f comm
@[to_additive]
lemma noncommProd_induction (s : Finset α) (f : α → β) (comm)
(p : β → Prop) (hom : ∀ a b, p a → p b → p (a * b)) (unit : p 1) (base : ∀ x ∈ s, p (f x)) :
p (s.noncommProd f comm) := by
refine Multiset.noncommProd_induction _ _ _ hom unit fun b hb ↦ ?_
obtain (⟨a, ha : a ∈ s, rfl : f a = b⟩) := by simpa using hb
exact base a ha
@[to_additive (attr := congr)]
theorem noncommProd_congr {s₁ s₂ : Finset α} {f g : α → β} (h₁ : s₁ = s₂)
(h₂ : ∀ x ∈ s₂, f x = g x) (comm) :
noncommProd s₁ f comm =
noncommProd s₂ g fun x hx y hy h => by
dsimp only [Function.onFun]
rw [← h₂ _ hx, ← h₂ _ hy]
subst h₁
exact comm hx hy h := by
simp_rw [noncommProd, Multiset.map_congr (congr_arg _ h₁) h₂]
@[to_additive (attr := simp)]
theorem noncommProd_toFinset [DecidableEq α] (l : List α) (f : α → β) (comm) (hl : l.Nodup) :
noncommProd l.toFinset f comm = (l.map f).prod := by
rw [← List.dedup_eq_self] at hl
simp [noncommProd, hl]
@[to_additive (attr := simp)]
theorem noncommProd_empty (f : α → β) (h) : noncommProd (∅ : Finset α) f h = 1 :=
rfl
@[to_additive (attr := simp)]
theorem noncommProd_cons (s : Finset α) (a : α) (f : α → β)
(ha : a ∉ s) (comm) :
noncommProd (cons a s ha) f comm =
f a * noncommProd s f (comm.mono fun _ => Finset.mem_cons.2 ∘ .inr) := by
simp_rw [noncommProd, Finset.cons_val, Multiset.map_cons, Multiset.noncommProd_cons]
@[to_additive]
theorem noncommProd_cons' (s : Finset α) (a : α) (f : α → β)
(ha : a ∉ s) (comm) :
noncommProd (cons a s ha) f comm =
noncommProd s f (comm.mono fun _ => Finset.mem_cons.2 ∘ .inr) * f a := by
simp_rw [noncommProd, Finset.cons_val, Multiset.map_cons, Multiset.noncommProd_cons']
@[to_additive (attr := simp)]
theorem noncommProd_insert_of_not_mem [DecidableEq α] (s : Finset α) (a : α) (f : α → β) (comm)
(ha : a ∉ s) :
noncommProd (insert a s) f comm =
f a * noncommProd s f (comm.mono fun _ => mem_insert_of_mem) := by
simp only [← cons_eq_insert _ _ ha, noncommProd_cons]
@[to_additive]
theorem noncommProd_insert_of_not_mem' [DecidableEq α] (s : Finset α) (a : α) (f : α → β) (comm)
(ha : a ∉ s) :
noncommProd (insert a s) f comm =
noncommProd s f (comm.mono fun _ => mem_insert_of_mem) * f a := by
simp only [← cons_eq_insert _ _ ha, noncommProd_cons']
@[to_additive (attr := simp)]
theorem noncommProd_singleton (a : α) (f : α → β) :
noncommProd ({a} : Finset α) f
(by
norm_cast
exact Set.pairwise_singleton _ _) =
f a := mul_one _
variable [FunLike F β γ]
@[to_additive]
theorem map_noncommProd [MonoidHomClass F β γ] (s : Finset α) (f : α → β) (comm) (g : F) :
g (s.noncommProd f comm) =
s.noncommProd (fun i => g (f i)) fun _ hx _ hy _ => (comm.of_refl hx hy).map g := by
simp [noncommProd, Multiset.map_noncommProd]
@[to_additive noncommSum_eq_card_nsmul]
theorem noncommProd_eq_pow_card (s : Finset α) (f : α → β) (comm) (m : β) (h : ∀ x ∈ s, f x = m) :
s.noncommProd f comm = m ^ s.card := by
rw [noncommProd, Multiset.noncommProd_eq_pow_card _ _ m]
· simp only [Finset.card_def, Multiset.card_map]
· simpa using h
@[to_additive]
theorem noncommProd_commute (s : Finset α) (f : α → β) (comm) (y : β)
(h : ∀ x ∈ s, Commute y (f x)) : Commute y (s.noncommProd f comm) := by
apply Multiset.noncommProd_commute
intro y
rw [Multiset.mem_map]
rintro ⟨x, ⟨hx, rfl⟩⟩
exact h x hx
theorem mul_noncommProd_erase [DecidableEq α] (s : Finset α) {a : α} (h : a ∈ s) (f : α → β) (comm)
(comm' := fun _ hx _ hy hxy ↦ comm (s.mem_of_mem_erase hx) (s.mem_of_mem_erase hy) hxy) :
f a * (s.erase a).noncommProd f comm' = s.noncommProd f comm := by
classical
simpa only [← Multiset.map_erase_of_mem _ _ h] using
Multiset.mul_noncommProd_erase (s.1.map f) (Multiset.mem_map_of_mem f h) _
theorem noncommProd_erase_mul [DecidableEq α] (s : Finset α) {a : α} (h : a ∈ s) (f : α → β) (comm)
(comm' := fun _ hx _ hy hxy ↦ comm (s.mem_of_mem_erase hx) (s.mem_of_mem_erase hy) hxy) :
(s.erase a).noncommProd f comm' * f a = s.noncommProd f comm := by
classical
simpa only [← Multiset.map_erase_of_mem _ _ h] using
Multiset.noncommProd_erase_mul (s.1.map f) (Multiset.mem_map_of_mem f h) _
@[to_additive]
theorem noncommProd_eq_prod {β : Type*} [CommMonoid β] (s : Finset α) (f : α → β) :
(noncommProd s f fun _ _ _ _ _ => Commute.all _ _) = s.prod f := by
induction' s using Finset.cons_induction_on with a s ha IH
· simp
· simp [ha, IH]
/-- The non-commutative version of `Finset.prod_union` -/
@[to_additive "The non-commutative version of `Finset.sum_union`"]
theorem noncommProd_union_of_disjoint [DecidableEq α] {s t : Finset α} (h : Disjoint s t)
(f : α → β) (comm : { x | x ∈ s ∪ t }.Pairwise (Commute on f)) :
| noncommProd (s ∪ t) f comm =
noncommProd s f (comm.mono <| coe_subset.2 subset_union_left) *
noncommProd t f (comm.mono <| coe_subset.2 subset_union_right) := by
obtain ⟨sl, sl', rfl⟩ := exists_list_nodup_eq s
| Mathlib/Data/Finset/NoncommProd.lean | 359 | 362 |
/-
Copyright (c) 2019 Johan Commelin. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johan Commelin, Kenny Lau, María Inés de Frutos-Fernández, Filippo A. E. Nuccio
-/
import Mathlib.Algebra.Polynomial.FieldDivision
import Mathlib.RingTheory.DiscreteValuationRing.Basic
import Mathlib.RingTheory.MvPowerSeries.Inverse
import Mathlib.RingTheory.PowerSeries.NoZeroDivisors
import Mathlib.RingTheory.LocalRing.ResidueField.Defs
import Mathlib.RingTheory.UniqueFactorizationDomain.Multiplicity
import Mathlib.Data.ENat.Lattice
/-! # Formal power series - Inverses
If the constant coefficient of a formal (univariate) power series is invertible,
then this formal power series is invertible.
(See the discussion in `Mathlib.RingTheory.MvPowerSeries.Inverse` for
the construction.)
Formal (univariate) power series over a local ring form a local ring.
Formal (univariate) power series over a field form a discrete valuation ring, and a normalization
monoid. The definition `residueFieldOfPowerSeries` provides the isomorphism between the residue
field of `k⟦X⟧` and `k`, when `k` is a field.
-/
noncomputable section
open Polynomial
open Finset (antidiagonal mem_antidiagonal)
namespace PowerSeries
open Finsupp (single)
variable {R : Type*}
section Ring
variable [Ring R]
/-- Auxiliary function used for computing inverse of a power series -/
protected def inv.aux : R → R⟦X⟧ → R⟦X⟧ :=
MvPowerSeries.inv.aux
theorem coeff_inv_aux (n : ℕ) (a : R) (φ : R⟦X⟧) :
coeff R n (inv.aux a φ) =
if n = 0 then a
else
-a *
∑ x ∈ antidiagonal n,
if x.2 < n then coeff R x.1 φ * coeff R x.2 (inv.aux a φ) else 0 := by
rw [coeff, inv.aux, MvPowerSeries.coeff_inv_aux]
simp only [Finsupp.single_eq_zero]
split_ifs; · rfl
congr 1
symm
apply Finset.sum_nbij' (fun (a, b) ↦ (single () a, single () b))
fun (f, g) ↦ (f (), g ())
· aesop
· aesop
· aesop
· aesop
· rintro ⟨i, j⟩ _hij
obtain H | H := le_or_lt n j
· aesop
rw [if_pos H, if_pos]
· rfl
refine ⟨?_, fun hh ↦ H.not_le ?_⟩
· rintro ⟨⟩
simpa [Finsupp.single_eq_same] using le_of_lt H
· simpa [Finsupp.single_eq_same] using hh ()
/-- A formal power series is invertible if the constant coefficient is invertible. -/
def invOfUnit (φ : R⟦X⟧) (u : Rˣ) : R⟦X⟧ :=
MvPowerSeries.invOfUnit φ u
theorem coeff_invOfUnit (n : ℕ) (φ : R⟦X⟧) (u : Rˣ) :
coeff R n (invOfUnit φ u) =
if n = 0 then ↑u⁻¹
else
-↑u⁻¹ *
∑ x ∈ antidiagonal n,
if x.2 < n then coeff R x.1 φ * coeff R x.2 (invOfUnit φ u) else 0 :=
coeff_inv_aux n (↑u⁻¹ : R) φ
@[simp]
theorem constantCoeff_invOfUnit (φ : R⟦X⟧) (u : Rˣ) :
constantCoeff R (invOfUnit φ u) = ↑u⁻¹ := by
rw [← coeff_zero_eq_constantCoeff_apply, coeff_invOfUnit, if_pos rfl]
@[simp]
theorem mul_invOfUnit (φ : R⟦X⟧) (u : Rˣ) (h : constantCoeff R φ = u) :
φ * invOfUnit φ u = 1 :=
MvPowerSeries.mul_invOfUnit φ u <| h
@[simp]
theorem invOfUnit_mul (φ : R⟦X⟧) (u : Rˣ) (h : constantCoeff R φ = u) :
invOfUnit φ u * φ = 1 :=
MvPowerSeries.invOfUnit_mul φ u h
theorem isUnit_iff_constantCoeff {φ : R⟦X⟧} :
IsUnit φ ↔ IsUnit (constantCoeff R φ) :=
MvPowerSeries.isUnit_iff_constantCoeff
/-- Two ways of removing the constant coefficient of a power series are the same. -/
theorem sub_const_eq_shift_mul_X (φ : R⟦X⟧) :
φ - C R (constantCoeff R φ) = (mk fun p ↦ coeff R (p + 1) φ) * X :=
sub_eq_iff_eq_add.mpr (eq_shift_mul_X_add_const φ)
theorem sub_const_eq_X_mul_shift (φ : R⟦X⟧) :
φ - C R (constantCoeff R φ) = X * mk fun p ↦ coeff R (p + 1) φ :=
sub_eq_iff_eq_add.mpr (eq_X_mul_shift_add_const φ)
end Ring
section Field
variable {k : Type*} [Field k]
/-- The inverse 1/f of a power series f defined over a field -/
protected def inv : k⟦X⟧ → k⟦X⟧ :=
MvPowerSeries.inv
instance : Inv k⟦X⟧ := ⟨PowerSeries.inv⟩
theorem inv_eq_inv_aux (φ : k⟦X⟧) : φ⁻¹ = inv.aux (constantCoeff k φ)⁻¹ φ :=
rfl
theorem coeff_inv (n) (φ : k⟦X⟧) :
coeff k n φ⁻¹ =
if n = 0 then (constantCoeff k φ)⁻¹
else
-(constantCoeff k φ)⁻¹ *
∑ x ∈ antidiagonal n,
if x.2 < n then coeff k x.1 φ * coeff k x.2 φ⁻¹ else 0 := by
rw [inv_eq_inv_aux, coeff_inv_aux n (constantCoeff k φ)⁻¹ φ]
@[simp]
theorem constantCoeff_inv (φ : k⟦X⟧) : constantCoeff k φ⁻¹ = (constantCoeff k φ)⁻¹ :=
MvPowerSeries.constantCoeff_inv φ
theorem inv_eq_zero {φ : k⟦X⟧} : φ⁻¹ = 0 ↔ constantCoeff k φ = 0 :=
MvPowerSeries.inv_eq_zero
theorem zero_inv : (0 : k⟦X⟧)⁻¹ = 0 :=
MvPowerSeries.zero_inv
@[simp]
theorem invOfUnit_eq (φ : k⟦X⟧) (h : constantCoeff k φ ≠ 0) :
invOfUnit φ (Units.mk0 _ h) = φ⁻¹ :=
MvPowerSeries.invOfUnit_eq _ _
@[simp]
theorem invOfUnit_eq' (φ : k⟦X⟧) (u : Units k) (h : constantCoeff k φ = u) :
invOfUnit φ u = φ⁻¹ :=
MvPowerSeries.invOfUnit_eq' φ _ h
@[simp]
protected theorem mul_inv_cancel (φ : k⟦X⟧) (h : constantCoeff k φ ≠ 0) : φ * φ⁻¹ = 1 :=
MvPowerSeries.mul_inv_cancel φ h
@[simp]
protected theorem inv_mul_cancel (φ : k⟦X⟧) (h : constantCoeff k φ ≠ 0) : φ⁻¹ * φ = 1 :=
MvPowerSeries.inv_mul_cancel φ h
theorem eq_mul_inv_iff_mul_eq {φ₁ φ₂ φ₃ : k⟦X⟧} (h : constantCoeff k φ₃ ≠ 0) :
φ₁ = φ₂ * φ₃⁻¹ ↔ φ₁ * φ₃ = φ₂ :=
MvPowerSeries.eq_mul_inv_iff_mul_eq h
theorem eq_inv_iff_mul_eq_one {φ ψ : k⟦X⟧} (h : constantCoeff k ψ ≠ 0) :
φ = ψ⁻¹ ↔ φ * ψ = 1 :=
MvPowerSeries.eq_inv_iff_mul_eq_one h
theorem inv_eq_iff_mul_eq_one {φ ψ : k⟦X⟧} (h : constantCoeff k ψ ≠ 0) :
ψ⁻¹ = φ ↔ φ * ψ = 1 :=
MvPowerSeries.inv_eq_iff_mul_eq_one h
protected theorem mul_inv_rev (φ ψ : k⟦X⟧) : (φ * ψ)⁻¹ = ψ⁻¹ * φ⁻¹ :=
MvPowerSeries.mul_inv_rev _ _
instance : InvOneClass k⟦X⟧ :=
{ inferInstanceAs <| InvOneClass <| MvPowerSeries Unit k with }
@[simp]
theorem C_inv (r : k) : (C k r)⁻¹ = C k r⁻¹ :=
MvPowerSeries.C_inv _
@[simp]
theorem X_inv : (X : k⟦X⟧)⁻¹ = 0 :=
MvPowerSeries.X_inv _
theorem smul_inv (r : k) (φ : k⟦X⟧) : (r • φ)⁻¹ = r⁻¹ • φ⁻¹ :=
MvPowerSeries.smul_inv _ _
/-- `firstUnitCoeff` is the non-zero coefficient whose index is `f.order`, seen as a unit of the
field. It is obtained using `divided_by_X_pow_order`, defined in `PowerSeries.Order`. -/
def firstUnitCoeff {f : k⟦X⟧} (hf : f ≠ 0) : kˣ :=
have : Invertible (constantCoeff k (divXPowOrder f)) := by
apply invertibleOfNonzero
simpa [constantCoeff_divXPowOrder_eq_zero_iff.not]
unitOfInvertible (constantCoeff k (divXPowOrder f))
/-- `Inv_divided_by_X_pow_order` is the inverse of the element obtained by diving a non-zero power
series by the largest power of `X` dividing it. Useful to create a term of type `Units`, done in
`Unit_divided_by_X_pow_order` -/
def Inv_divided_by_X_pow_order {f : k⟦X⟧} (hf : f ≠ 0) : k⟦X⟧ :=
invOfUnit (divXPowOrder f) (firstUnitCoeff hf)
@[simp]
theorem Inv_divided_by_X_pow_order_rightInv {f : k⟦X⟧} (hf : f ≠ 0) :
divXPowOrder f * Inv_divided_by_X_pow_order hf = 1 :=
mul_invOfUnit (divXPowOrder f) (firstUnitCoeff hf) rfl
@[simp]
theorem Inv_divided_by_X_pow_order_leftInv {f : k⟦X⟧} (hf : f ≠ 0) :
Inv_divided_by_X_pow_order hf * divXPowOrder f = 1 := by
rw [mul_comm]
exact mul_invOfUnit (divXPowOrder f) (firstUnitCoeff hf) rfl
open scoped Classical in
/-- `Unit_of_divided_by_X_pow_order` is the unit power series obtained by dividing a non-zero
power series by the largest power of `X` that divides it. -/
def Unit_of_divided_by_X_pow_order (f : k⟦X⟧) : k⟦X⟧ˣ :=
if hf : f = 0 then 1
else
{ val := divXPowOrder f
inv := Inv_divided_by_X_pow_order hf
val_inv := Inv_divided_by_X_pow_order_rightInv hf
inv_val := Inv_divided_by_X_pow_order_leftInv hf }
theorem isUnit_divided_by_X_pow_order {f : k⟦X⟧} (hf : f ≠ 0) :
IsUnit (divXPowOrder f) :=
⟨Unit_of_divided_by_X_pow_order f,
by simp only [Unit_of_divided_by_X_pow_order, dif_neg hf, Units.val_mk]⟩
theorem Unit_of_divided_by_X_pow_order_nonzero {f : k⟦X⟧} (hf : f ≠ 0) :
↑(Unit_of_divided_by_X_pow_order f) = divXPowOrder f := by
simp only [Unit_of_divided_by_X_pow_order, dif_neg hf, Units.val_mk]
@[simp]
theorem Unit_of_divided_by_X_pow_order_zero : Unit_of_divided_by_X_pow_order (0 : k⟦X⟧) = 1 := by
simp only [Unit_of_divided_by_X_pow_order, dif_pos]
theorem eq_divided_by_X_pow_order_Iff_Unit {f : k⟦X⟧} (hf : f ≠ 0) :
f = divXPowOrder f ↔ IsUnit f :=
⟨fun h ↦ by rw [h]; exact isUnit_divided_by_X_pow_order hf, fun h ↦ by
have : f.order = 0 := by
simp [order_zero_of_unit h]
conv_lhs => rw [← X_pow_order_mul_divXPowOrder (f := f), this, ENat.toNat_zero,
pow_zero, one_mul]⟩
end Field
section IsLocalRing
variable {S : Type*} [CommRing R] [CommRing S] (f : R →+* S) [IsLocalHom f]
@[instance]
theorem map.isLocalHom : IsLocalHom (map f) :=
MvPowerSeries.map.isLocalHom f
variable [IsLocalRing R]
instance : IsLocalRing R⟦X⟧ :=
{ inferInstanceAs <| IsLocalRing <| MvPowerSeries Unit R with }
| end IsLocalRing
section IsDiscreteValuationRing
| Mathlib/RingTheory/PowerSeries/Inverse.lean | 275 | 277 |
/-
Copyright (c) 2019 Jeremy Avigad. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Jeremy Avigad, Sébastien Gouëzel, Yury Kudryashov
-/
import Mathlib.Analysis.Asymptotics.AsymptoticEquivalent
import Mathlib.Analysis.Calculus.FDeriv.Linear
import Mathlib.Analysis.Calculus.FDeriv.Comp
/-!
# The derivative of a linear equivalence
For detailed documentation of the Fréchet derivative,
see the module docstring of `Analysis/Calculus/FDeriv/Basic.lean`.
This file contains the usual formulas (and existence assertions) for the derivative of
continuous linear equivalences.
We also prove the usual formula for the derivative of the inverse function, assuming it exists.
The inverse function theorem is in `Mathlib/Analysis/Calculus/InverseFunctionTheorem/FDeriv.lean`.
-/
open Filter Asymptotics ContinuousLinearMap Set Metric Topology NNReal ENNReal
noncomputable section
section
variable {𝕜 : Type*} [NontriviallyNormedField 𝕜]
variable {E : Type*} [NormedAddCommGroup E] [NormedSpace 𝕜 E]
variable {F : Type*} [NormedAddCommGroup F] [NormedSpace 𝕜 F]
variable {G : Type*} [NormedAddCommGroup G] [NormedSpace 𝕜 G]
variable {G' : Type*} [NormedAddCommGroup G'] [NormedSpace 𝕜 G']
variable {f : E → F} {f' : E →L[𝕜] F} {x : E} {s : Set E} {c : F}
namespace ContinuousLinearEquiv
/-! ### Differentiability of linear equivs, and invariance of differentiability -/
variable (iso : E ≃L[𝕜] F)
@[fun_prop]
protected theorem hasStrictFDerivAt : HasStrictFDerivAt iso (iso : E →L[𝕜] F) x :=
iso.toContinuousLinearMap.hasStrictFDerivAt
@[fun_prop]
protected theorem hasFDerivWithinAt : HasFDerivWithinAt iso (iso : E →L[𝕜] F) s x :=
iso.toContinuousLinearMap.hasFDerivWithinAt
@[fun_prop]
protected theorem hasFDerivAt : HasFDerivAt iso (iso : E →L[𝕜] F) x :=
iso.toContinuousLinearMap.hasFDerivAtFilter
@[fun_prop]
protected theorem differentiableAt : DifferentiableAt 𝕜 iso x :=
iso.hasFDerivAt.differentiableAt
@[fun_prop]
protected theorem differentiableWithinAt : DifferentiableWithinAt 𝕜 iso s x :=
iso.differentiableAt.differentiableWithinAt
protected theorem fderiv : fderiv 𝕜 iso x = iso :=
iso.hasFDerivAt.fderiv
protected theorem fderivWithin (hxs : UniqueDiffWithinAt 𝕜 s x) : fderivWithin 𝕜 iso s x = iso :=
iso.toContinuousLinearMap.fderivWithin hxs
@[fun_prop]
protected theorem differentiable : Differentiable 𝕜 iso := fun _ => iso.differentiableAt
@[fun_prop]
protected theorem differentiableOn : DifferentiableOn 𝕜 iso s :=
iso.differentiable.differentiableOn
theorem comp_differentiableWithinAt_iff {f : G → E} {s : Set G} {x : G} :
DifferentiableWithinAt 𝕜 (iso ∘ f) s x ↔ DifferentiableWithinAt 𝕜 f s x := by
refine
⟨fun H => ?_, fun H => iso.differentiable.differentiableAt.comp_differentiableWithinAt x H⟩
have : DifferentiableWithinAt 𝕜 (iso.symm ∘ iso ∘ f) s x :=
iso.symm.differentiable.differentiableAt.comp_differentiableWithinAt x H
rwa [← Function.comp_assoc iso.symm iso f, iso.symm_comp_self] at this
theorem comp_differentiableAt_iff {f : G → E} {x : G} :
DifferentiableAt 𝕜 (iso ∘ f) x ↔ DifferentiableAt 𝕜 f x := by
rw [← differentiableWithinAt_univ, ← differentiableWithinAt_univ,
iso.comp_differentiableWithinAt_iff]
theorem comp_differentiableOn_iff {f : G → E} {s : Set G} :
DifferentiableOn 𝕜 (iso ∘ f) s ↔ DifferentiableOn 𝕜 f s := by
rw [DifferentiableOn, DifferentiableOn]
simp only [iso.comp_differentiableWithinAt_iff]
theorem comp_differentiable_iff {f : G → E} : Differentiable 𝕜 (iso ∘ f) ↔ Differentiable 𝕜 f := by
rw [← differentiableOn_univ, ← differentiableOn_univ]
exact iso.comp_differentiableOn_iff
theorem comp_hasFDerivWithinAt_iff {f : G → E} {s : Set G} {x : G} {f' : G →L[𝕜] E} :
HasFDerivWithinAt (iso ∘ f) ((iso : E →L[𝕜] F).comp f') s x ↔ HasFDerivWithinAt f f' s x := by
refine ⟨fun H => ?_, fun H => iso.hasFDerivAt.comp_hasFDerivWithinAt x H⟩
have A : f = iso.symm ∘ iso ∘ f := by
rw [← Function.comp_assoc, iso.symm_comp_self]
rfl
have B : f' = (iso.symm : F →L[𝕜] E).comp ((iso : E →L[𝕜] F).comp f') := by
rw [← ContinuousLinearMap.comp_assoc, iso.coe_symm_comp_coe, ContinuousLinearMap.id_comp]
rw [A, B]
exact iso.symm.hasFDerivAt.comp_hasFDerivWithinAt x H
theorem comp_hasStrictFDerivAt_iff {f : G → E} {x : G} {f' : G →L[𝕜] E} :
HasStrictFDerivAt (iso ∘ f) ((iso : E →L[𝕜] F).comp f') x ↔ HasStrictFDerivAt f f' x := by
refine ⟨fun H => ?_, fun H => iso.hasStrictFDerivAt.comp x H⟩
convert iso.symm.hasStrictFDerivAt.comp x H using 1 <;>
ext z <;> apply (iso.symm_apply_apply _).symm
theorem comp_hasFDerivAt_iff {f : G → E} {x : G} {f' : G →L[𝕜] E} :
HasFDerivAt (iso ∘ f) ((iso : E →L[𝕜] F).comp f') x ↔ HasFDerivAt f f' x := by
simp_rw [← hasFDerivWithinAt_univ, iso.comp_hasFDerivWithinAt_iff]
theorem comp_hasFDerivWithinAt_iff' {f : G → E} {s : Set G} {x : G} {f' : G →L[𝕜] F} :
HasFDerivWithinAt (iso ∘ f) f' s x ↔
HasFDerivWithinAt f ((iso.symm : F →L[𝕜] E).comp f') s x := by
rw [← iso.comp_hasFDerivWithinAt_iff, ← ContinuousLinearMap.comp_assoc, iso.coe_comp_coe_symm,
ContinuousLinearMap.id_comp]
theorem comp_hasFDerivAt_iff' {f : G → E} {x : G} {f' : G →L[𝕜] F} :
HasFDerivAt (iso ∘ f) f' x ↔ HasFDerivAt f ((iso.symm : F →L[𝕜] E).comp f') x := by
simp_rw [← hasFDerivWithinAt_univ, iso.comp_hasFDerivWithinAt_iff']
theorem comp_fderivWithin {f : G → E} {s : Set G} {x : G} (hxs : UniqueDiffWithinAt 𝕜 s x) :
fderivWithin 𝕜 (iso ∘ f) s x = (iso : E →L[𝕜] F).comp (fderivWithin 𝕜 f s x) := by
by_cases h : DifferentiableWithinAt 𝕜 f s x
· rw [fderiv_comp_fderivWithin x iso.differentiableAt h hxs, iso.fderiv]
· have : ¬DifferentiableWithinAt 𝕜 (iso ∘ f) s x := mt iso.comp_differentiableWithinAt_iff.1 h
rw [fderivWithin_zero_of_not_differentiableWithinAt h,
fderivWithin_zero_of_not_differentiableWithinAt this, ContinuousLinearMap.comp_zero]
theorem comp_fderiv {f : G → E} {x : G} :
fderiv 𝕜 (iso ∘ f) x = (iso : E →L[𝕜] F).comp (fderiv 𝕜 f x) := by
rw [← fderivWithin_univ, ← fderivWithin_univ]
exact iso.comp_fderivWithin uniqueDiffWithinAt_univ
lemma _root_.fderivWithin_continuousLinearEquiv_comp (L : G ≃L[𝕜] G') (f : E → (F →L[𝕜] G))
(hs : UniqueDiffWithinAt 𝕜 s x) :
fderivWithin 𝕜 (fun x ↦ (L : G →L[𝕜] G').comp (f x)) s x =
(((ContinuousLinearEquiv.refl 𝕜 F).arrowCongr L)) ∘L (fderivWithin 𝕜 f s x) := by
change fderivWithin 𝕜 (((ContinuousLinearEquiv.refl 𝕜 F).arrowCongr L) ∘ f) s x = _
rw [ContinuousLinearEquiv.comp_fderivWithin _ hs]
lemma _root_.fderiv_continuousLinearEquiv_comp (L : G ≃L[𝕜] G') (f : E → (F →L[𝕜] G)) (x : E) :
fderiv 𝕜 (fun x ↦ (L : G →L[𝕜] G').comp (f x)) x =
(((ContinuousLinearEquiv.refl 𝕜 F).arrowCongr L)) ∘L (fderiv 𝕜 f x) := by
change fderiv 𝕜 (((ContinuousLinearEquiv.refl 𝕜 F).arrowCongr L) ∘ f) x = _
rw [ContinuousLinearEquiv.comp_fderiv]
lemma _root_.fderiv_continuousLinearEquiv_comp' (L : G ≃L[𝕜] G') (f : E → (F →L[𝕜] G)) :
fderiv 𝕜 (fun x ↦ (L : G →L[𝕜] G').comp (f x)) =
fun x ↦ (((ContinuousLinearEquiv.refl 𝕜 F).arrowCongr L)) ∘L (fderiv 𝕜 f x) := by
ext x : 1
exact fderiv_continuousLinearEquiv_comp L f x
theorem comp_right_differentiableWithinAt_iff {f : F → G} {s : Set F} {x : E} :
DifferentiableWithinAt 𝕜 (f ∘ iso) (iso ⁻¹' s) x ↔ DifferentiableWithinAt 𝕜 f s (iso x) := by
refine ⟨fun H => ?_, fun H => H.comp x iso.differentiableWithinAt (mapsTo_preimage _ s)⟩
have : DifferentiableWithinAt 𝕜 ((f ∘ iso) ∘ iso.symm) s (iso x) := by
rw [← iso.symm_apply_apply x] at H
apply H.comp (iso x) iso.symm.differentiableWithinAt
intro y hy
simpa only [mem_preimage, apply_symm_apply] using hy
rwa [Function.comp_assoc, iso.self_comp_symm] at this
theorem comp_right_differentiableAt_iff {f : F → G} {x : E} :
DifferentiableAt 𝕜 (f ∘ iso) x ↔ DifferentiableAt 𝕜 f (iso x) := by
simp only [← differentiableWithinAt_univ, ← iso.comp_right_differentiableWithinAt_iff,
preimage_univ]
theorem comp_right_differentiableOn_iff {f : F → G} {s : Set F} :
DifferentiableOn 𝕜 (f ∘ iso) (iso ⁻¹' s) ↔ DifferentiableOn 𝕜 f s := by
refine ⟨fun H y hy => ?_, fun H y hy => iso.comp_right_differentiableWithinAt_iff.2 (H _ hy)⟩
rw [← iso.apply_symm_apply y, ← comp_right_differentiableWithinAt_iff]
apply H
simpa only [mem_preimage, apply_symm_apply] using hy
theorem comp_right_differentiable_iff {f : F → G} :
Differentiable 𝕜 (f ∘ iso) ↔ Differentiable 𝕜 f := by
simp only [← differentiableOn_univ, ← iso.comp_right_differentiableOn_iff, preimage_univ]
theorem comp_right_hasFDerivWithinAt_iff {f : F → G} {s : Set F} {x : E} {f' : F →L[𝕜] G} :
HasFDerivWithinAt (f ∘ iso) (f'.comp (iso : E →L[𝕜] F)) (iso ⁻¹' s) x ↔
HasFDerivWithinAt f f' s (iso x) := by
refine ⟨fun H => ?_, fun H => H.comp x iso.hasFDerivWithinAt (mapsTo_preimage _ s)⟩
rw [← iso.symm_apply_apply x] at H
have A : f = (f ∘ iso) ∘ iso.symm := by
rw [Function.comp_assoc, iso.self_comp_symm]
rfl
have B : f' = (f'.comp (iso : E →L[𝕜] F)).comp (iso.symm : F →L[𝕜] E) := by
rw [ContinuousLinearMap.comp_assoc, iso.coe_comp_coe_symm, ContinuousLinearMap.comp_id]
rw [A, B]
apply H.comp (iso x) iso.symm.hasFDerivWithinAt
intro y hy
simpa only [mem_preimage, apply_symm_apply] using hy
theorem comp_right_hasFDerivAt_iff {f : F → G} {x : E} {f' : F →L[𝕜] G} :
HasFDerivAt (f ∘ iso) (f'.comp (iso : E →L[𝕜] F)) x ↔ HasFDerivAt f f' (iso x) := by
simp only [← hasFDerivWithinAt_univ, ← comp_right_hasFDerivWithinAt_iff, preimage_univ]
theorem comp_right_hasFDerivWithinAt_iff' {f : F → G} {s : Set F} {x : E} {f' : E →L[𝕜] G} :
HasFDerivWithinAt (f ∘ iso) f' (iso ⁻¹' s) x ↔
HasFDerivWithinAt f (f'.comp (iso.symm : F →L[𝕜] E)) s (iso x) := by
rw [← iso.comp_right_hasFDerivWithinAt_iff, ContinuousLinearMap.comp_assoc,
iso.coe_symm_comp_coe, ContinuousLinearMap.comp_id]
theorem comp_right_hasFDerivAt_iff' {f : F → G} {x : E} {f' : E →L[𝕜] G} :
HasFDerivAt (f ∘ iso) f' x ↔ HasFDerivAt f (f'.comp (iso.symm : F →L[𝕜] E)) (iso x) := by
simp only [← hasFDerivWithinAt_univ, ← iso.comp_right_hasFDerivWithinAt_iff', preimage_univ]
theorem comp_right_fderivWithin {f : F → G} {s : Set F} {x : E}
(hxs : UniqueDiffWithinAt 𝕜 (iso ⁻¹' s) x) :
fderivWithin 𝕜 (f ∘ iso) (iso ⁻¹' s) x =
(fderivWithin 𝕜 f s (iso x)).comp (iso : E →L[𝕜] F) := by
by_cases h : DifferentiableWithinAt 𝕜 f s (iso x)
· exact (iso.comp_right_hasFDerivWithinAt_iff.2 h.hasFDerivWithinAt).fderivWithin hxs
· have : ¬DifferentiableWithinAt 𝕜 (f ∘ iso) (iso ⁻¹' s) x := by
intro h'
exact h (iso.comp_right_differentiableWithinAt_iff.1 h')
rw [fderivWithin_zero_of_not_differentiableWithinAt h,
fderivWithin_zero_of_not_differentiableWithinAt this, ContinuousLinearMap.zero_comp]
theorem comp_right_fderiv {f : F → G} {x : E} :
fderiv 𝕜 (f ∘ iso) x = (fderiv 𝕜 f (iso x)).comp (iso : E →L[𝕜] F) := by
rw [← fderivWithin_univ, ← fderivWithin_univ, ← iso.comp_right_fderivWithin, preimage_univ]
exact uniqueDiffWithinAt_univ
end ContinuousLinearEquiv
namespace LinearIsometryEquiv
/-! ### Differentiability of linear isometry equivs, and invariance of differentiability -/
variable (iso : E ≃ₗᵢ[𝕜] F)
@[fun_prop]
protected theorem hasStrictFDerivAt : HasStrictFDerivAt iso (iso : E →L[𝕜] F) x :=
(iso : E ≃L[𝕜] F).hasStrictFDerivAt
@[fun_prop]
protected theorem hasFDerivWithinAt : HasFDerivWithinAt iso (iso : E →L[𝕜] F) s x :=
(iso : E ≃L[𝕜] F).hasFDerivWithinAt
@[fun_prop]
protected theorem hasFDerivAt : HasFDerivAt iso (iso : E →L[𝕜] F) x :=
(iso : E ≃L[𝕜] F).hasFDerivAt
@[fun_prop]
protected theorem differentiableAt : DifferentiableAt 𝕜 iso x :=
iso.hasFDerivAt.differentiableAt
@[fun_prop]
protected theorem differentiableWithinAt : DifferentiableWithinAt 𝕜 iso s x :=
iso.differentiableAt.differentiableWithinAt
protected theorem fderiv : fderiv 𝕜 iso x = iso :=
iso.hasFDerivAt.fderiv
protected theorem fderivWithin (hxs : UniqueDiffWithinAt 𝕜 s x) : fderivWithin 𝕜 iso s x = iso :=
(iso : E ≃L[𝕜] F).fderivWithin hxs
@[fun_prop]
protected theorem differentiable : Differentiable 𝕜 iso := fun _ => iso.differentiableAt
@[fun_prop]
protected theorem differentiableOn : DifferentiableOn 𝕜 iso s :=
iso.differentiable.differentiableOn
theorem comp_differentiableWithinAt_iff {f : G → E} {s : Set G} {x : G} :
DifferentiableWithinAt 𝕜 (iso ∘ f) s x ↔ DifferentiableWithinAt 𝕜 f s x :=
(iso : E ≃L[𝕜] F).comp_differentiableWithinAt_iff
theorem comp_differentiableAt_iff {f : G → E} {x : G} :
DifferentiableAt 𝕜 (iso ∘ f) x ↔ DifferentiableAt 𝕜 f x :=
(iso : E ≃L[𝕜] F).comp_differentiableAt_iff
theorem comp_differentiableOn_iff {f : G → E} {s : Set G} :
DifferentiableOn 𝕜 (iso ∘ f) s ↔ DifferentiableOn 𝕜 f s :=
(iso : E ≃L[𝕜] F).comp_differentiableOn_iff
theorem comp_differentiable_iff {f : G → E} : Differentiable 𝕜 (iso ∘ f) ↔ Differentiable 𝕜 f :=
(iso : E ≃L[𝕜] F).comp_differentiable_iff
theorem comp_hasFDerivWithinAt_iff {f : G → E} {s : Set G} {x : G} {f' : G →L[𝕜] E} :
HasFDerivWithinAt (iso ∘ f) ((iso : E →L[𝕜] F).comp f') s x ↔ HasFDerivWithinAt f f' s x :=
(iso : E ≃L[𝕜] F).comp_hasFDerivWithinAt_iff
theorem comp_hasStrictFDerivAt_iff {f : G → E} {x : G} {f' : G →L[𝕜] E} :
HasStrictFDerivAt (iso ∘ f) ((iso : E →L[𝕜] F).comp f') x ↔ HasStrictFDerivAt f f' x :=
(iso : E ≃L[𝕜] F).comp_hasStrictFDerivAt_iff
theorem comp_hasFDerivAt_iff {f : G → E} {x : G} {f' : G →L[𝕜] E} :
HasFDerivAt (iso ∘ f) ((iso : E →L[𝕜] F).comp f') x ↔ HasFDerivAt f f' x :=
(iso : E ≃L[𝕜] F).comp_hasFDerivAt_iff
theorem comp_hasFDerivWithinAt_iff' {f : G → E} {s : Set G} {x : G} {f' : G →L[𝕜] F} :
HasFDerivWithinAt (iso ∘ f) f' s x ↔ HasFDerivWithinAt f ((iso.symm : F →L[𝕜] E).comp f') s x :=
(iso : E ≃L[𝕜] F).comp_hasFDerivWithinAt_iff'
theorem comp_hasFDerivAt_iff' {f : G → E} {x : G} {f' : G →L[𝕜] F} :
HasFDerivAt (iso ∘ f) f' x ↔ HasFDerivAt f ((iso.symm : F →L[𝕜] E).comp f') x :=
(iso : E ≃L[𝕜] F).comp_hasFDerivAt_iff'
theorem comp_fderivWithin {f : G → E} {s : Set G} {x : G} (hxs : UniqueDiffWithinAt 𝕜 s x) :
fderivWithin 𝕜 (iso ∘ f) s x = (iso : E →L[𝕜] F).comp (fderivWithin 𝕜 f s x) :=
(iso : E ≃L[𝕜] F).comp_fderivWithin hxs
theorem comp_fderiv {f : G → E} {x : G} :
fderiv 𝕜 (iso ∘ f) x = (iso : E →L[𝕜] F).comp (fderiv 𝕜 f x) :=
(iso : E ≃L[𝕜] F).comp_fderiv
theorem comp_fderiv' {f : G → E} :
fderiv 𝕜 (iso ∘ f) = fun x ↦ (iso : E →L[𝕜] F).comp (fderiv 𝕜 f x) := by
ext x : 1
exact LinearIsometryEquiv.comp_fderiv iso
end LinearIsometryEquiv
/-- If `f (g y) = y` for `y` in a neighborhood of `a` within `t`,
`g` maps a neighborhood of `a` within `t` to a neighborhood of `g a` within `s`,
and `f` has an invertible derivative `f'` at `g a` within `s`,
then `g` has the derivative `f'⁻¹` at `a` within `t`.
This is one of the easy parts of the inverse function theorem: it assumes that we already have an
inverse function. -/
theorem HasFDerivWithinAt.of_local_left_inverse {g : F → E} {f' : E ≃L[𝕜] F} {a : F} {t : Set F}
(hg : Tendsto g (𝓝[t] a) (𝓝[s] (g a))) (hf : HasFDerivWithinAt f (f' : E →L[𝕜] F) s (g a))
(ha : a ∈ t) (hfg : ∀ᶠ y in 𝓝[t] a, f (g y) = y) :
HasFDerivWithinAt g (f'.symm : F →L[𝕜] E) t a := by
have : (fun x : F => g x - g a - f'.symm (x - a)) =O[𝓝[t] a]
fun x : F => f' (g x - g a) - (x - a) :=
((f'.symm : F →L[𝕜] E).isBigO_comp _ _).congr (fun x ↦ by simp) fun _ ↦ rfl
refine .of_isLittleO <| this.trans_isLittleO ?_
clear this
refine ((hf.isLittleO.comp_tendsto hg).symm.congr' (hfg.mono ?_) .rfl).trans_isBigO ?_
· intro p hp
simp [hp, hfg.self_of_nhdsWithin ha]
· refine ((hf.isBigO_sub_rev f'.antilipschitz).comp_tendsto hg).congr'
(Eventually.of_forall fun _ => rfl) (hfg.mono ?_)
rintro p hp
simp only [(· ∘ ·), hp, hfg.self_of_nhdsWithin ha]
/-- If `f (g y) = y` for `y` in some neighborhood of `a`, `g` is continuous at `a`, and `f` has an
invertible derivative `f'` at `g a` in the strict sense, then `g` has the derivative `f'⁻¹` at `a`
in the strict sense.
This is one of the easy parts of the inverse function theorem: it assumes that we already have an
inverse function. -/
theorem HasStrictFDerivAt.of_local_left_inverse {f : E → F} {f' : E ≃L[𝕜] F} {g : F → E} {a : F}
(hg : ContinuousAt g a) (hf : HasStrictFDerivAt f (f' : E →L[𝕜] F) (g a))
(hfg : ∀ᶠ y in 𝓝 a, f (g y) = y) : HasStrictFDerivAt g (f'.symm : F →L[𝕜] E) a := by
replace hg := hg.prodMap' hg
replace hfg := hfg.prodMk_nhds hfg
have :
(fun p : F × F => g p.1 - g p.2 - f'.symm (p.1 - p.2)) =O[𝓝 (a, a)] fun p : F × F =>
f' (g p.1 - g p.2) - (p.1 - p.2) := by
refine ((f'.symm : F →L[𝕜] E).isBigO_comp _ _).congr (fun x => ?_) fun _ => rfl
simp
refine .of_isLittleO <| this.trans_isLittleO ?_
clear this
refine ((hf.isLittleO.comp_tendsto hg).symm.congr'
(hfg.mono ?_) (Eventually.of_forall fun _ => rfl)).trans_isBigO ?_
· rintro p ⟨hp1, hp2⟩
simp [hp1, hp2]
· refine (hf.isBigO_sub_rev.comp_tendsto hg).congr' (Eventually.of_forall fun _ => rfl)
(hfg.mono ?_)
rintro p ⟨hp1, hp2⟩
simp only [(· ∘ ·), hp1, hp2, Prod.map]
/-- If `f (g y) = y` for `y` in some neighborhood of `a`, `g` is continuous at `a`, and `f` has an
invertible derivative `f'` at `g a`, then `g` has the derivative `f'⁻¹` at `a`.
This is one of the easy parts of the inverse function theorem: it assumes that we already have
an inverse function. -/
theorem HasFDerivAt.of_local_left_inverse {f : E → F} {f' : E ≃L[𝕜] F} {g : F → E} {a : F}
(hg : ContinuousAt g a) (hf : HasFDerivAt f (f' : E →L[𝕜] F) (g a))
(hfg : ∀ᶠ y in 𝓝 a, f (g y) = y) : HasFDerivAt g (f'.symm : F →L[𝕜] E) a := by
simp only [← hasFDerivWithinAt_univ, ← nhdsWithin_univ] at hf hfg ⊢
exact hf.of_local_left_inverse (.inf hg (by simp)) (mem_univ _) hfg
/-- If `f` is a partial homeomorphism defined on a neighbourhood of `f.symm a`, and `f` has an
invertible derivative `f'` in the sense of strict differentiability at `f.symm a`, then `f.symm` has
the derivative `f'⁻¹` at `a`.
This is one of the easy parts of the inverse function theorem: it assumes that we already have
an inverse function. -/
theorem PartialHomeomorph.hasStrictFDerivAt_symm (f : PartialHomeomorph E F) {f' : E ≃L[𝕜] F}
{a : F} (ha : a ∈ f.target) (htff' : HasStrictFDerivAt f (f' : E →L[𝕜] F) (f.symm a)) :
HasStrictFDerivAt f.symm (f'.symm : F →L[𝕜] E) a :=
htff'.of_local_left_inverse (f.symm.continuousAt ha) (f.eventually_right_inverse ha)
/-- If `f` is a partial homeomorphism defined on a neighbourhood of `f.symm a`, and `f` has an
invertible derivative `f'` at `f.symm a`, then `f.symm` has the derivative `f'⁻¹` at `a`.
This is one of the easy parts of the inverse function theorem: it assumes that we already have
an inverse function. -/
theorem PartialHomeomorph.hasFDerivAt_symm (f : PartialHomeomorph E F) {f' : E ≃L[𝕜] F} {a : F}
(ha : a ∈ f.target) (htff' : HasFDerivAt f (f' : E →L[𝕜] F) (f.symm a)) :
HasFDerivAt f.symm (f'.symm : F →L[𝕜] E) a :=
htff'.of_local_left_inverse (f.symm.continuousAt ha) (f.eventually_right_inverse ha)
theorem HasFDerivWithinAt.eventually_ne (h : HasFDerivWithinAt f f' s x)
(hf' : ∃ C, ∀ z, ‖z‖ ≤ C * ‖f' z‖) : ∀ᶠ z in 𝓝[s \ {x}] x, f z ≠ c := by
rcases eq_or_ne (f x) c with rfl | hc
· rw [nhdsWithin, diff_eq, ← inf_principal, ← inf_assoc, eventually_inf_principal]
have A : (fun z => z - x) =O[𝓝[s] x] fun z => f' (z - x) :=
isBigO_iff.2 <| hf'.imp fun C hC => Eventually.of_forall fun z => hC _
have : (fun z => f z - f x) ~[𝓝[s] x] fun z => f' (z - x) := h.isLittleO.trans_isBigO A
simpa [not_imp_not, sub_eq_zero] using (A.trans this.isBigO_symm).eq_zero_imp
· exact (h.continuousWithinAt.eventually_ne hc).filter_mono <| by gcongr; apply diff_subset
theorem HasFDerivAt.eventually_ne (h : HasFDerivAt f f' x) (hf' : ∃ C, ∀ z, ‖z‖ ≤ C * ‖f' z‖) :
∀ᶠ z in 𝓝[≠] x, f z ≠ c := by
simpa only [compl_eq_univ_diff] using (hasFDerivWithinAt_univ.2 h).eventually_ne hf'
end
section
/-
In the special case of a normed space over the reals,
we can use scalar multiplication in the `tendsto` characterization
of the Fréchet derivative.
-/
variable {E : Type*} [NormedAddCommGroup E] [NormedSpace ℝ E]
variable {F : Type*} [NormedAddCommGroup F] [NormedSpace ℝ F]
variable {f : E → F} {f' : E →L[ℝ] F} {x : E}
theorem has_fderiv_at_filter_real_equiv {L : Filter E} :
Tendsto (fun x' : E => ‖x' - x‖⁻¹ * ‖f x' - f x - f' (x' - x)‖) L (𝓝 0) ↔
Tendsto (fun x' : E => ‖x' - x‖⁻¹ • (f x' - f x - f' (x' - x))) L (𝓝 0) := by
symm
rw [tendsto_iff_norm_sub_tendsto_zero]
refine tendsto_congr fun x' => ?_
simp [norm_smul]
theorem HasFDerivAt.lim_real (hf : HasFDerivAt f f' x) (v : E) :
Tendsto (fun c : ℝ => c • (f (x + c⁻¹ • v) - f x)) atTop (𝓝 (f' v)) := by
apply hf.lim v
rw [tendsto_atTop_atTop]
exact fun b => ⟨b, fun a ha => le_trans ha (le_abs_self _)⟩
end
section TangentCone
variable {𝕜 : Type*} [NontriviallyNormedField 𝕜] {E : Type*} [NormedAddCommGroup E]
[NormedSpace 𝕜 E] {F : Type*} [NormedAddCommGroup F] [NormedSpace 𝕜 F] {f : E → F} {s : Set E}
{f' : E →L[𝕜] F}
/-- The image of a tangent cone under the differential of a map is included in the tangent cone to
the image. -/
theorem HasFDerivWithinAt.mapsTo_tangent_cone {x : E} (h : HasFDerivWithinAt f f' s x) :
MapsTo f' (tangentConeAt 𝕜 s x) (tangentConeAt 𝕜 (f '' s) (f x)) := by
rintro v ⟨c, d, dtop, clim, cdlim⟩
refine
⟨c, fun n => f (x + d n) - f x, mem_of_superset dtop ?_, clim, h.lim atTop dtop clim cdlim⟩
simp +contextual [-mem_image, mem_image_of_mem]
/-- If a set has the unique differentiability property at a point x, then the image of this set
under a map with onto derivative has also the unique differentiability property at the image point.
| -/
theorem HasFDerivWithinAt.uniqueDiffWithinAt {x : E} (h : HasFDerivWithinAt f f' s x)
(hs : UniqueDiffWithinAt 𝕜 s x) (h' : DenseRange f') : UniqueDiffWithinAt 𝕜 (f '' s) (f x) := by
| Mathlib/Analysis/Calculus/FDeriv/Equiv.lean | 468 | 470 |
/-
Copyright (c) 2022 Eric Rodriguez. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Eric Rodriguez
-/
import Mathlib.Algebra.GroupWithZero.Units.Lemmas
import Mathlib.Algebra.Order.BigOperators.Group.Finset
import Mathlib.Algebra.Order.Ring.Cast
import Mathlib.Data.Fintype.BigOperators
import Mathlib.Tactic.DeriveFintype
/-!
# Sign function
This file defines the sign function for types with zero and a decidable less-than relation, and
proves some basic theorems about it.
-/
-- Don't generate unnecessary `sizeOf_spec` lemmas which the `simpNF` linter will complain about.
set_option genSizeOfSpec false in
/-- The type of signs. -/
inductive SignType
| zero
| neg
| pos
deriving DecidableEq, Inhabited, Fintype
namespace SignType
instance : Zero SignType :=
⟨zero⟩
instance : One SignType :=
⟨pos⟩
instance : Neg SignType :=
⟨fun s =>
match s with
| neg => pos
| zero => zero
| pos => neg⟩
@[simp]
theorem zero_eq_zero : zero = 0 :=
rfl
@[simp]
theorem neg_eq_neg_one : neg = -1 :=
rfl
@[simp]
theorem pos_eq_one : pos = 1 :=
rfl
instance : Mul SignType :=
⟨fun x y =>
match x with
| neg => -y
| zero => zero
| pos => y⟩
/-- The less-than-or-equal relation on signs. -/
protected inductive LE : SignType → SignType → Prop
| of_neg (a) : SignType.LE neg a
| zero : SignType.LE zero zero
| of_pos (a) : SignType.LE a pos
instance : LE SignType :=
⟨SignType.LE⟩
instance LE.decidableRel : DecidableRel SignType.LE := fun a b => by
cases a <;> cases b <;> first | exact isTrue (by constructor)| exact isFalse (by rintro ⟨_⟩)
instance decidableEq : DecidableEq SignType := fun a b => by
cases a <;> cases b <;> first | exact isTrue (by constructor)| exact isFalse (by rintro ⟨_⟩)
private lemma mul_comm : ∀ (a b : SignType), a * b = b * a := by rintro ⟨⟩ ⟨⟩ <;> rfl
private lemma mul_assoc : ∀ (a b c : SignType), (a * b) * c = a * (b * c) := by
rintro ⟨⟩ ⟨⟩ ⟨⟩ <;> rfl
/- We can define a `Field` instance on `SignType`, but it's not mathematically sensible,
so we only define the `CommGroupWithZero`. -/
instance : CommGroupWithZero SignType where
zero := 0
one := 1
mul := (· * ·)
inv := id
mul_zero a := by cases a <;> rfl
zero_mul a := by cases a <;> rfl
mul_one a := by cases a <;> rfl
one_mul a := by cases a <;> rfl
mul_inv_cancel a ha := by cases a <;> trivial
mul_comm := mul_comm
mul_assoc := mul_assoc
exists_pair_ne := ⟨0, 1, by rintro ⟨_⟩⟩
inv_zero := rfl
private lemma le_antisymm (a b : SignType) (_ : a ≤ b) (_ : b ≤ a) : a = b := by
cases a <;> cases b <;> trivial
private lemma le_trans (a b c : SignType) (_ : a ≤ b) (_ : b ≤ c) : a ≤ c := by
cases a <;> cases b <;> cases c <;> tauto
instance : LinearOrder SignType where
le := (· ≤ ·)
le_refl a := by cases a <;> constructor
le_total a b := by cases a <;> cases b <;> first | left; constructor | right; constructor
le_antisymm := le_antisymm
le_trans := le_trans
toDecidableLE := LE.decidableRel
toDecidableEq := SignType.decidableEq
instance : BoundedOrder SignType where
top := 1
le_top := LE.of_pos
bot := -1
bot_le :=
#adaptation_note /-- https://github.com/leanprover/lean4/pull/6053
Added `by exact`, but don't understand why it was needed. -/
by exact LE.of_neg
instance : HasDistribNeg SignType :=
{ neg_neg := fun x => by cases x <;> rfl
neg_mul := fun x y => by cases x <;> cases y <;> rfl
mul_neg := fun x y => by cases x <;> cases y <;> rfl }
/-- `SignType` is equivalent to `Fin 3`. -/
def fin3Equiv : SignType ≃* Fin 3 where
toFun a :=
match a with
| 0 => ⟨0, by simp⟩
| 1 => ⟨1, by simp⟩
| -1 => ⟨2, by simp⟩
invFun a :=
match a with
| ⟨0, _⟩ => 0
| ⟨1, _⟩ => 1
| ⟨2, _⟩ => -1
left_inv a := by cases a <;> rfl
right_inv a :=
match a with
| ⟨0, _⟩ => by simp
| ⟨1, _⟩ => by simp
| ⟨2, _⟩ => by simp
map_mul' a b := by
cases a <;> cases b <;> rfl
section CaseBashing
theorem nonneg_iff {a : SignType} : 0 ≤ a ↔ a = 0 ∨ a = 1 := by decide +revert
theorem nonneg_iff_ne_neg_one {a : SignType} : 0 ≤ a ↔ a ≠ -1 := by decide +revert
theorem neg_one_lt_iff {a : SignType} : -1 < a ↔ 0 ≤ a := by decide +revert
theorem nonpos_iff {a : SignType} : a ≤ 0 ↔ a = -1 ∨ a = 0 := by decide +revert
theorem nonpos_iff_ne_one {a : SignType} : a ≤ 0 ↔ a ≠ 1 := by decide +revert
theorem lt_one_iff {a : SignType} : a < 1 ↔ a ≤ 0 := by decide +revert
@[simp]
theorem neg_iff {a : SignType} : a < 0 ↔ a = -1 := by decide +revert
@[simp]
theorem le_neg_one_iff {a : SignType} : a ≤ -1 ↔ a = -1 :=
le_bot_iff
@[simp]
theorem pos_iff {a : SignType} : 0 < a ↔ a = 1 := by decide +revert
@[simp]
theorem one_le_iff {a : SignType} : 1 ≤ a ↔ a = 1 :=
top_le_iff
@[simp]
theorem neg_one_le (a : SignType) : -1 ≤ a :=
bot_le
@[simp]
theorem le_one (a : SignType) : a ≤ 1 :=
le_top
@[simp]
theorem not_lt_neg_one (a : SignType) : ¬a < -1 :=
not_lt_bot
@[simp]
theorem not_one_lt (a : SignType) : ¬1 < a :=
not_top_lt
@[simp]
theorem self_eq_neg_iff (a : SignType) : a = -a ↔ a = 0 := by decide +revert
@[simp]
theorem neg_eq_self_iff (a : SignType) : -a = a ↔ a = 0 := by decide +revert
@[simp]
theorem neg_one_lt_one : (-1 : SignType) < 1 :=
bot_lt_top
end CaseBashing
section cast
variable {α : Type*} [Zero α] [One α] [Neg α]
/-- Turn a `SignType` into zero, one, or minus one. This is a coercion instance. -/
@[coe]
def cast : SignType → α
| zero => 0
| pos => 1
| neg => -1
/-- This is a `CoeTail` since the type on the right (trivially) determines the type on the left.
`outParam`-wise it could be a `Coe`, but we don't want to try applying this instance for a
coercion to any `α`.
-/
instance : CoeTail SignType α :=
⟨cast⟩
/-- Casting out of `SignType` respects composition with functions preserving `0, 1, -1`. -/
lemma map_cast' {β : Type*} [One β] [Neg β] [Zero β]
(f : α → β) (h₁ : f 1 = 1) (h₂ : f 0 = 0) (h₃ : f (-1) = -1) (s : SignType) :
f s = s := by
cases s <;> simp only [SignType.cast, h₁, h₂, h₃]
/-- Casting out of `SignType` respects composition with suitable bundled homomorphism types. -/
lemma map_cast {α β F : Type*} [AddGroupWithOne α] [One β] [SubtractionMonoid β]
[FunLike F α β] [AddMonoidHomClass F α β] [OneHomClass F α β] (f : F) (s : SignType) :
f s = s := by
apply map_cast' <;> simp
@[simp]
theorem coe_zero : ↑(0 : SignType) = (0 : α) :=
rfl
@[simp]
theorem coe_one : ↑(1 : SignType) = (1 : α) :=
rfl
@[simp]
theorem coe_neg_one : ↑(-1 : SignType) = (-1 : α) :=
rfl
@[simp, norm_cast]
lemma coe_neg {α : Type*} [One α] [SubtractionMonoid α] (s : SignType) :
(↑(-s) : α) = -↑s := by
cases s <;> simp
/-- Casting `SignType → ℤ → α` is the same as casting directly `SignType → α`. -/
@[simp, norm_cast]
lemma intCast_cast {α : Type*} [AddGroupWithOne α] (s : SignType) : ((s : ℤ) : α) = s :=
map_cast' _ Int.cast_one Int.cast_zero (@Int.cast_one α _ ▸ Int.cast_neg 1) _
end cast
/-- `SignType.cast` as a `MulWithZeroHom`. -/
@[simps]
def castHom {α} [MulZeroOneClass α] [HasDistribNeg α] : SignType →*₀ α where
toFun := cast
map_zero' := rfl
map_one' := rfl
map_mul' x y := by cases x <;> cases y <;> simp [zero_eq_zero, pos_eq_one, neg_eq_neg_one]
theorem univ_eq : (Finset.univ : Finset SignType) = {0, -1, 1} := by
decide
theorem range_eq {α} (f : SignType → α) : Set.range f = {f zero, f neg, f pos} := by
classical rw [← Fintype.coe_image_univ, univ_eq]
classical simp [Finset.coe_insert]
@[simp, norm_cast] lemma coe_mul {α} [MulZeroOneClass α] [HasDistribNeg α] (a b : SignType) :
↑(a * b) = (a : α) * b :=
map_mul SignType.castHom _ _
@[simp, norm_cast] lemma coe_pow {α} [MonoidWithZero α] [HasDistribNeg α] (a : SignType) (k : ℕ) :
↑(a ^ k) = (a : α) ^ k :=
map_pow SignType.castHom _ _
@[simp, norm_cast] lemma coe_zpow {α} [GroupWithZero α] [HasDistribNeg α] (a : SignType) (k : ℤ) :
↑(a ^ k) = (a : α) ^ k :=
map_zpow₀ SignType.castHom _ _
end SignType
-- The lemma `exists_signed_sum` needs explicit universe handling in its statement.
universe u
variable {α : Type u}
open SignType
section Preorder
variable [Zero α] [Preorder α] [DecidableLT α] {a : α}
/-- The sign of an element is 1 if it's positive, -1 if negative, 0 otherwise. -/
def SignType.sign : α →o SignType :=
⟨fun a => if 0 < a then 1 else if a < 0 then -1 else 0, fun a b h => by
dsimp
split_ifs with h₁ h₂ h₃ h₄ _ _ h₂ h₃ <;> try constructor
· cases lt_irrefl 0 (h₁.trans <| h.trans_lt h₃)
· cases h₂ (h₁.trans_le h)
· cases h₄ (h.trans_lt h₃)⟩
theorem sign_apply : sign a = ite (0 < a) 1 (ite (a < 0) (-1) 0) :=
rfl
@[simp]
theorem sign_zero : sign (0 : α) = 0 := by simp [sign_apply]
@[simp]
theorem sign_pos (ha : 0 < a) : sign a = 1 := by rwa [sign_apply, if_pos]
@[simp]
theorem sign_neg (ha : a < 0) : sign a = -1 := by rwa [sign_apply, if_neg <| asymm ha, if_pos]
theorem sign_eq_one_iff : sign a = 1 ↔ 0 < a := by
refine ⟨fun h => ?_, fun h => sign_pos h⟩
by_contra hn
rw [sign_apply, if_neg hn] at h
split_ifs at h
theorem sign_eq_neg_one_iff : sign a = -1 ↔ a < 0 := by
refine ⟨fun h => ?_, fun h => sign_neg h⟩
rw [sign_apply] at h
split_ifs at h
assumption
end Preorder
section LinearOrder
variable [Zero α] [LinearOrder α] {a : α}
/-- `SignType.sign` respects strictly monotone zero-preserving maps. -/
lemma StrictMono.sign_comp {β F : Type*} [Zero β] [Preorder β] [DecidableLT β]
[FunLike F α β] [ZeroHomClass F α β] {f : F} (hf : StrictMono f) (a : α) :
sign (f a) = sign a := by
simp only [sign_apply, ← map_zero f, hf.lt_iff_lt]
@[simp]
theorem sign_eq_zero_iff : sign a = 0 ↔ a = 0 := by
| refine ⟨fun h => ?_, fun h => h.symm ▸ sign_zero⟩
| Mathlib/Data/Sign.lean | 346 | 346 |
/-
Copyright (c) 2019 Reid Barton. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Reid Barton, Kim Morrison
-/
import Mathlib.CategoryTheory.Limits.Shapes.FiniteLimits
/-!
# Filtered categories
A category is filtered if every finite diagram admits a cocone.
We give a simple characterisation of this condition as
1. for every pair of objects there exists another object "to the right",
2. for every pair of parallel morphisms there exists a morphism to the right so the compositions
are equal, and
3. there exists some object.
Filtered colimits are often better behaved than arbitrary colimits.
See `CategoryTheory/Limits/Types` for some details.
Filtered categories are nice because colimits indexed by filtered categories tend to be
easier to describe than general colimits (and more often preserved by functors).
In this file we show that any functor from a finite category to a filtered category admits a cocone:
* `cocone_nonempty [FinCategory J] [IsFiltered C] (F : J ⥤ C) : Nonempty (Cocone F)`
More generally,
for any finite collection of objects and morphisms between them in a filtered category
(even if not closed under composition) there exists some object `Z` receiving maps from all of them,
so that all the triangles (one edge from the finite set, two from morphisms to `Z`) commute.
This formulation is often more useful in practice and is available via `sup_exists`,
which takes a finset of objects, and an indexed family (indexed by source and target)
of finsets of morphisms.
We also prove the converse of `cocone_nonempty` as `of_cocone_nonempty`.
Furthermore, we give special support for two diagram categories: The `bowtie` and the `tulip`.
This is because these shapes show up in the proofs that forgetful functors of algebraic categories
(e.g. `MonCat`, `CommRingCat`, ...) preserve filtered colimits.
All of the above API, except for the `bowtie` and the `tulip`, is also provided for cofiltered
categories.
## See also
In `CategoryTheory.Limits.FilteredColimitCommutesFiniteLimit` we show that filtered colimits
commute with finite limits.
There is another characterization of filtered categories, namely that whenever `F : J ⥤ C` is a
functor from a finite category, there is `X : C` such that `Nonempty (limit (F.op ⋙ yoneda.obj X))`.
This is shown in `CategoryTheory.Limits.Filtered`.
-/
open Function
-- declare the `v`'s first; see `CategoryTheory.Category` for an explanation
universe w v v₁ v₂ u u₁ u₂
namespace CategoryTheory
variable (C : Type u) [Category.{v} C]
/-- A category `IsFilteredOrEmpty` if
1. for every pair of objects there exists another object "to the right", and
2. for every pair of parallel morphisms there exists a morphism to the right so the compositions
are equal.
-/
class IsFilteredOrEmpty : Prop where
/-- for every pair of objects there exists another object "to the right" -/
cocone_objs : ∀ X Y : C, ∃ (Z : _) (_ : X ⟶ Z) (_ : Y ⟶ Z), True
/-- for every pair of parallel morphisms there exists a morphism to the right
so the compositions are equal -/
cocone_maps : ∀ ⦃X Y : C⦄ (f g : X ⟶ Y), ∃ (Z : _) (h : Y ⟶ Z), f ≫ h = g ≫ h
/-- A category `IsFiltered` if
1. for every pair of objects there exists another object "to the right",
2. for every pair of parallel morphisms there exists a morphism to the right so the compositions
are equal, and
3. there exists some object. -/
@[stacks 002V "They also define a diagram being filtered."]
class IsFiltered : Prop extends IsFilteredOrEmpty C where
/-- a filtered category must be non empty -/
-- This should be an instance but it causes significant slowdown
[nonempty : Nonempty C]
instance (priority := 100) isFilteredOrEmpty_of_semilatticeSup (α : Type u) [SemilatticeSup α] :
IsFilteredOrEmpty α where
cocone_objs X Y := ⟨X ⊔ Y, homOfLE le_sup_left, homOfLE le_sup_right, trivial⟩
cocone_maps X Y f g := ⟨Y, 𝟙 _, by subsingleton⟩
instance (priority := 100) isFiltered_of_semilatticeSup_nonempty (α : Type u) [SemilatticeSup α]
[Nonempty α] : IsFiltered α where
instance (priority := 100) isFilteredOrEmpty_of_directed_le (α : Type u) [Preorder α]
[IsDirected α (· ≤ ·)] : IsFilteredOrEmpty α where
cocone_objs X Y :=
let ⟨Z, h1, h2⟩ := exists_ge_ge X Y
⟨Z, homOfLE h1, homOfLE h2, trivial⟩
cocone_maps X Y f g := ⟨Y, 𝟙 _, by subsingleton⟩
instance (priority := 100) isFiltered_of_directed_le_nonempty (α : Type u) [Preorder α]
[IsDirected α (· ≤ ·)] [Nonempty α] : IsFiltered α where
-- Sanity checks
example (α : Type u) [SemilatticeSup α] [OrderBot α] : IsFiltered α := by infer_instance
example (α : Type u) [SemilatticeSup α] [OrderTop α] : IsFiltered α := by infer_instance
instance : IsFiltered (Discrete PUnit) where
cocone_objs X Y := ⟨⟨PUnit.unit⟩, ⟨⟨by trivial⟩⟩, ⟨⟨by subsingleton⟩⟩, trivial⟩
cocone_maps X Y f g := ⟨⟨PUnit.unit⟩, ⟨⟨by trivial⟩⟩, by subsingleton⟩
namespace IsFiltered
section AllowEmpty
variable {C}
variable [IsFilteredOrEmpty C]
/-- `max j j'` is an arbitrary choice of object to the right of both `j` and `j'`,
whose existence is ensured by `IsFiltered`.
-/
noncomputable def max (j j' : C) : C :=
(IsFilteredOrEmpty.cocone_objs j j').choose
/-- `leftToMax j j'` is an arbitrary choice of morphism from `j` to `max j j'`,
whose existence is ensured by `IsFiltered`.
-/
noncomputable def leftToMax (j j' : C) : j ⟶ max j j' :=
(IsFilteredOrEmpty.cocone_objs j j').choose_spec.choose
/-- `rightToMax j j'` is an arbitrary choice of morphism from `j'` to `max j j'`,
whose existence is ensured by `IsFiltered`.
-/
noncomputable def rightToMax (j j' : C) : j' ⟶ max j j' :=
(IsFilteredOrEmpty.cocone_objs j j').choose_spec.choose_spec.choose
/-- `coeq f f'`, for morphisms `f f' : j ⟶ j'`, is an arbitrary choice of object
which admits a morphism `coeqHom f f' : j' ⟶ coeq f f'` such that
`coeq_condition : f ≫ coeqHom f f' = f' ≫ coeqHom f f'`.
Its existence is ensured by `IsFiltered`.
-/
noncomputable def coeq {j j' : C} (f f' : j ⟶ j') : C :=
(IsFilteredOrEmpty.cocone_maps f f').choose
/-- `coeqHom f f'`, for morphisms `f f' : j ⟶ j'`, is an arbitrary choice of morphism
`coeqHom f f' : j' ⟶ coeq f f'` such that
`coeq_condition : f ≫ coeqHom f f' = f' ≫ coeqHom f f'`.
Its existence is ensured by `IsFiltered`.
-/
noncomputable def coeqHom {j j' : C} (f f' : j ⟶ j') : j' ⟶ coeq f f' :=
(IsFilteredOrEmpty.cocone_maps f f').choose_spec.choose
-- Porting note: the simp tag has been removed as the linter complained
/-- `coeq_condition f f'`, for morphisms `f f' : j ⟶ j'`, is the proof that
`f ≫ coeqHom f f' = f' ≫ coeqHom f f'`.
-/
@[reassoc]
theorem coeq_condition {j j' : C} (f f' : j ⟶ j') : f ≫ coeqHom f f' = f' ≫ coeqHom f f' :=
(IsFilteredOrEmpty.cocone_maps f f').choose_spec.choose_spec
end AllowEmpty
end IsFiltered
namespace IsFilteredOrEmpty
open IsFiltered
variable {C}
variable [IsFilteredOrEmpty C]
variable {D : Type u₁} [Category.{v₁} D]
/-- If `C` is filtered or empty, and we have a functor `R : C ⥤ D` with a left adjoint, then `D` is
filtered or empty.
-/
theorem of_right_adjoint {L : D ⥤ C} {R : C ⥤ D} (h : L ⊣ R) : IsFilteredOrEmpty D :=
{ cocone_objs := fun X Y =>
⟨R.obj (max (L.obj X) (L.obj Y)),
h.homEquiv _ _ (leftToMax _ _), h.homEquiv _ _ (rightToMax _ _), ⟨⟩⟩
cocone_maps := fun X Y f g =>
⟨R.obj (coeq (L.map f) (L.map g)), h.homEquiv _ _ (coeqHom _ _), by
rw [← h.homEquiv_naturality_left, ← h.homEquiv_naturality_left, coeq_condition]⟩ }
/-- If `C` is filtered or empty, and we have a right adjoint functor `R : C ⥤ D`, then `D` is
filtered or empty. -/
theorem of_isRightAdjoint (R : C ⥤ D) [R.IsRightAdjoint] : IsFilteredOrEmpty D :=
of_right_adjoint (Adjunction.ofIsRightAdjoint R)
/-- Being filtered or empty is preserved by equivalence of categories. -/
theorem of_equivalence (h : C ≌ D) : IsFilteredOrEmpty D :=
of_right_adjoint h.symm.toAdjunction
end IsFilteredOrEmpty
namespace IsFiltered
section Nonempty
open CategoryTheory.Limits
variable {C}
variable [IsFiltered C]
/-- Any finite collection of objects in a filtered category has an object "to the right".
-/
theorem sup_objs_exists (O : Finset C) : ∃ S : C, ∀ {X}, X ∈ O → Nonempty (X ⟶ S) := by
classical
induction' O using Finset.induction with X O' nm h
· exact ⟨Classical.choice IsFiltered.nonempty, by intro; simp⟩
· obtain ⟨S', w'⟩ := h
use max X S'
rintro Y mY
obtain rfl | h := eq_or_ne Y X
· exact ⟨leftToMax _ _⟩
· exact ⟨(w' (Finset.mem_of_mem_insert_of_ne mY h)).some ≫ rightToMax _ _⟩
variable (O : Finset C) (H : Finset (Σ' (X Y : C) (_ : X ∈ O) (_ : Y ∈ O), X ⟶ Y))
/-- Given any `Finset` of objects `{X, ...}` and
indexed collection of `Finset`s of morphisms `{f, ...}` in `C`,
there exists an object `S`, with a morphism `T X : X ⟶ S` from each `X`,
such that the triangles commute: `f ≫ T Y = T X`, for `f : X ⟶ Y` in the `Finset`.
-/
theorem sup_exists :
∃ (S : C) (T : ∀ {X : C}, X ∈ O → (X ⟶ S)),
∀ {X Y : C} (mX : X ∈ O) (mY : Y ∈ O) {f : X ⟶ Y},
(⟨X, Y, mX, mY, f⟩ : Σ' (X Y : C) (_ : X ∈ O) (_ : Y ∈ O), X ⟶ Y) ∈ H →
f ≫ T mY = T mX := by
classical
induction' H using Finset.induction with h' H' nmf h''
· obtain ⟨S, f⟩ := sup_objs_exists O
exact ⟨S, fun mX => (f mX).some, by rintro - - - - - ⟨⟩⟩
· obtain ⟨X, Y, mX, mY, f⟩ := h'
obtain ⟨S', T', w'⟩ := h''
refine ⟨coeq (f ≫ T' mY) (T' mX), fun mZ => T' mZ ≫ coeqHom (f ≫ T' mY) (T' mX), ?_⟩
intro X' Y' mX' mY' f' mf'
rw [← Category.assoc]
by_cases h : X = X' ∧ Y = Y'
· rcases h with ⟨rfl, rfl⟩
by_cases hf : f = f'
· subst hf
apply coeq_condition
| · rw [@w' _ _ mX mY f']
simp only [Finset.mem_insert, PSigma.mk.injEq, heq_eq_eq, true_and] at mf'
rcases mf' with mf' | mf'
· exfalso
exact hf mf'.symm
· exact mf'
· rw [@w' _ _ mX' mY' f' _]
apply Finset.mem_of_mem_insert_of_ne mf'
contrapose! h
obtain ⟨rfl, h⟩ := h
| Mathlib/CategoryTheory/Filtered/Basic.lean | 243 | 252 |
/-
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
-/
import Mathlib.Analysis.Complex.Asymptotics
import Mathlib.Analysis.SpecificLimits.Normed
import Mathlib.Data.Complex.Trigonometric
/-!
# Complex and real exponential
In this file we prove continuity of `Complex.exp` and `Real.exp`. We also prove a few facts about
limits of `Real.exp` at infinity.
## Tags
exp
-/
noncomputable section
open Asymptotics Bornology Finset Filter Function Metric Set Topology
open scoped Nat
namespace Complex
variable {z y x : ℝ}
theorem exp_bound_sq (x z : ℂ) (hz : ‖z‖ ≤ 1) :
‖exp (x + z) - exp x - z • exp x‖ ≤ ‖exp x‖ * ‖z‖ ^ 2 :=
calc
‖exp (x + z) - exp x - z * exp x‖ = ‖exp x * (exp z - 1 - z)‖ := by
congr
rw [exp_add]
ring
_ = ‖exp x‖ * ‖exp z - 1 - z‖ := norm_mul _ _
_ ≤ ‖exp x‖ * ‖z‖ ^ 2 :=
mul_le_mul_of_nonneg_left (norm_exp_sub_one_sub_id_le hz) (norm_nonneg _)
theorem locally_lipschitz_exp {r : ℝ} (hr_nonneg : 0 ≤ r) (hr_le : r ≤ 1) (x y : ℂ)
(hyx : ‖y - x‖ < r) : ‖exp y - exp x‖ ≤ (1 + r) * ‖exp x‖ * ‖y - x‖ := by
have hy_eq : y = x + (y - x) := by abel
have hyx_sq_le : ‖y - x‖ ^ 2 ≤ r * ‖y - x‖ := by
rw [pow_two]
exact mul_le_mul hyx.le le_rfl (norm_nonneg _) hr_nonneg
have h_sq : ∀ z, ‖z‖ ≤ 1 → ‖exp (x + z) - exp x‖ ≤ ‖z‖ * ‖exp x‖ + ‖exp x‖ * ‖z‖ ^ 2 := by
intro z hz
have : ‖exp (x + z) - exp x - z • exp x‖ ≤ ‖exp x‖ * ‖z‖ ^ 2 := exp_bound_sq x z hz
rw [← sub_le_iff_le_add', ← norm_smul z]
exact (norm_sub_norm_le _ _).trans this
calc
‖exp y - exp x‖ = ‖exp (x + (y - x)) - exp x‖ := by nth_rw 1 [hy_eq]
_ ≤ ‖y - x‖ * ‖exp x‖ + ‖exp x‖ * ‖y - x‖ ^ 2 := h_sq (y - x) (hyx.le.trans hr_le)
_ ≤ ‖y - x‖ * ‖exp x‖ + ‖exp x‖ * (r * ‖y - x‖) :=
(add_le_add_left (mul_le_mul le_rfl hyx_sq_le (sq_nonneg _) (norm_nonneg _)) _)
_ = (1 + r) * ‖exp x‖ * ‖y - x‖ := by ring
-- Porting note: proof by term mode `locally_lipschitz_exp zero_le_one le_rfl x`
-- doesn't work because `‖y - x‖` and `dist y x` don't unify
@[continuity]
theorem continuous_exp : Continuous exp :=
continuous_iff_continuousAt.mpr fun x =>
continuousAt_of_locally_lipschitz zero_lt_one (2 * ‖exp x‖)
(fun y ↦ by
convert locally_lipschitz_exp zero_le_one le_rfl x y using 2
congr
ring)
theorem continuousOn_exp {s : Set ℂ} : ContinuousOn exp s :=
continuous_exp.continuousOn
lemma exp_sub_sum_range_isBigO_pow (n : ℕ) :
(fun x ↦ exp x - ∑ i ∈ Finset.range n, x ^ i / i !) =O[𝓝 0] (· ^ n) := by
rcases (zero_le n).eq_or_lt with rfl | hn
· simpa using continuous_exp.continuousAt.norm.isBoundedUnder_le
· refine .of_bound (n.succ / (n ! * n)) ?_
rw [NormedAddCommGroup.nhds_zero_basis_norm_lt.eventually_iff]
refine ⟨1, one_pos, fun x hx ↦ ?_⟩
convert exp_bound hx.out.le hn using 1
field_simp [mul_comm]
lemma exp_sub_sum_range_succ_isLittleO_pow (n : ℕ) :
(fun x ↦ exp x - ∑ i ∈ Finset.range (n + 1), x ^ i / i !) =o[𝓝 0] (· ^ n) :=
(exp_sub_sum_range_isBigO_pow (n + 1)).trans_isLittleO <| isLittleO_pow_pow n.lt_succ_self
end Complex
section ComplexContinuousExpComp
variable {α : Type*}
open Complex
theorem Filter.Tendsto.cexp {l : Filter α} {f : α → ℂ} {z : ℂ} (hf : Tendsto f l (𝓝 z)) :
Tendsto (fun x => exp (f x)) l (𝓝 (exp z)) :=
(continuous_exp.tendsto _).comp hf
variable [TopologicalSpace α] {f : α → ℂ} {s : Set α} {x : α}
nonrec
theorem ContinuousWithinAt.cexp (h : ContinuousWithinAt f s x) :
ContinuousWithinAt (fun y => exp (f y)) s x :=
h.cexp
@[fun_prop]
nonrec
theorem ContinuousAt.cexp (h : ContinuousAt f x) : ContinuousAt (fun y => exp (f y)) x :=
h.cexp
@[fun_prop]
theorem ContinuousOn.cexp (h : ContinuousOn f s) : ContinuousOn (fun y => exp (f y)) s :=
fun x hx => (h x hx).cexp
@[fun_prop]
theorem Continuous.cexp (h : Continuous f) : Continuous fun y => exp (f y) :=
continuous_iff_continuousAt.2 fun _ => h.continuousAt.cexp
/-- The complex exponential function is uniformly continuous on left half planes. -/
lemma UniformContinuousOn.cexp (a : ℝ) : UniformContinuousOn exp {x : ℂ | x.re ≤ a} := by
have : Continuous (cexp - 1) := Continuous.sub (Continuous.cexp continuous_id') continuous_one
rw [Metric.uniformContinuousOn_iff, Metric.continuous_iff'] at *
intro ε hε
simp only [gt_iff_lt, Pi.sub_apply, Pi.one_apply, dist_sub_eq_dist_add_right,
sub_add_cancel] at this
have ha : 0 < ε / (2 * Real.exp a) := by positivity
have H := this 0 (ε / (2 * Real.exp a)) ha
rw [Metric.eventually_nhds_iff] at H
obtain ⟨δ, hδ⟩ := H
refine ⟨δ, hδ.1, ?_⟩
intros x _ y hy hxy
have h3 := hδ.2 (y := x - y) (by simpa only [dist_zero_right] using hxy)
rw [dist_eq_norm, exp_zero] at *
have : cexp x - cexp y = cexp y * (cexp (x - y) - 1) := by
rw [mul_sub_one, ← exp_add]
ring_nf
rw [this, mul_comm]
have hya : ‖cexp y‖ ≤ Real.exp a := by
simp only [norm_exp, Real.exp_le_exp]
exact hy
simp only [gt_iff_lt, dist_zero_right, Set.mem_setOf_eq, norm_mul, Complex.norm_exp] at *
apply lt_of_le_of_lt (mul_le_mul h3.le hya (Real.exp_nonneg y.re) (le_of_lt ha))
have hrr : ε / (2 * a.exp) * a.exp = ε / 2 := by
nth_rw 2 [mul_comm]
field_simp [mul_assoc]
rw [hrr]
exact div_two_lt_of_pos hε
@[deprecated (since := "2025-02-11")] alias UniformlyContinuousOn.cexp := UniformContinuousOn.cexp
end ComplexContinuousExpComp
namespace Real
@[continuity]
theorem continuous_exp : Continuous exp :=
Complex.continuous_re.comp Complex.continuous_ofReal.cexp
theorem continuousOn_exp {s : Set ℝ} : ContinuousOn exp s :=
continuous_exp.continuousOn
lemma exp_sub_sum_range_isBigO_pow (n : ℕ) :
(fun x ↦ exp x - ∑ i ∈ Finset.range n, x ^ i / i !) =O[𝓝 0] (· ^ n) := by
have := (Complex.exp_sub_sum_range_isBigO_pow n).comp_tendsto
(Complex.continuous_ofReal.tendsto' 0 0 rfl)
simp only [Function.comp_def] at this
norm_cast at this
lemma exp_sub_sum_range_succ_isLittleO_pow (n : ℕ) :
(fun x ↦ exp x - ∑ i ∈ Finset.range (n + 1), x ^ i / i !) =o[𝓝 0] (· ^ n) :=
(exp_sub_sum_range_isBigO_pow (n + 1)).trans_isLittleO <| isLittleO_pow_pow n.lt_succ_self
end Real
section RealContinuousExpComp
variable {α : Type*}
open Real
theorem Filter.Tendsto.rexp {l : Filter α} {f : α → ℝ} {z : ℝ} (hf : Tendsto f l (𝓝 z)) :
Tendsto (fun x => exp (f x)) l (𝓝 (exp z)) :=
(continuous_exp.tendsto _).comp hf
variable [TopologicalSpace α] {f : α → ℝ} {s : Set α} {x : α}
nonrec
theorem ContinuousWithinAt.rexp (h : ContinuousWithinAt f s x) :
ContinuousWithinAt (fun y ↦ exp (f y)) s x :=
h.rexp
@[fun_prop]
nonrec
theorem ContinuousAt.rexp (h : ContinuousAt f x) : ContinuousAt (fun y ↦ exp (f y)) x :=
h.rexp
@[fun_prop]
theorem ContinuousOn.rexp (h : ContinuousOn f s) :
ContinuousOn (fun y ↦ exp (f y)) s :=
fun x hx ↦ (h x hx).rexp
@[fun_prop]
theorem Continuous.rexp (h : Continuous f) : Continuous fun y ↦ exp (f y) :=
continuous_iff_continuousAt.2 fun _ ↦ h.continuousAt.rexp
end RealContinuousExpComp
namespace Real
variable {α : Type*} {x y z : ℝ} {l : Filter α}
theorem exp_half (x : ℝ) : exp (x / 2) = √(exp x) := by
rw [eq_comm, sqrt_eq_iff_eq_sq, sq, ← exp_add, add_halves] <;> exact (exp_pos _).le
/-- The real exponential function tends to `+∞` at `+∞`. -/
theorem tendsto_exp_atTop : Tendsto exp atTop atTop := by
have A : Tendsto (fun x : ℝ => x + 1) atTop atTop :=
tendsto_atTop_add_const_right atTop 1 tendsto_id
have B : ∀ᶠ x in atTop, x + 1 ≤ exp x := eventually_atTop.2 ⟨0, fun x _ => add_one_le_exp x⟩
exact tendsto_atTop_mono' atTop B A
/-- The real exponential function tends to `0` at `-∞` or, equivalently, `exp(-x)` tends to `0`
at `+∞` -/
theorem tendsto_exp_neg_atTop_nhds_zero : Tendsto (fun x => exp (-x)) atTop (𝓝 0) :=
(tendsto_inv_atTop_zero.comp tendsto_exp_atTop).congr fun x => (exp_neg x).symm
/-- The real exponential function tends to `1` at `0`. -/
theorem tendsto_exp_nhds_zero_nhds_one : Tendsto exp (𝓝 0) (𝓝 1) := by
convert continuous_exp.tendsto 0
simp
theorem tendsto_exp_atBot : Tendsto exp atBot (𝓝 0) :=
(tendsto_exp_neg_atTop_nhds_zero.comp tendsto_neg_atBot_atTop).congr fun x =>
congr_arg exp <| neg_neg x
theorem tendsto_exp_atBot_nhdsGT : Tendsto exp atBot (𝓝[>] 0) :=
tendsto_inf.2 ⟨tendsto_exp_atBot, tendsto_principal.2 <| Eventually.of_forall exp_pos⟩
@[deprecated (since := "2024-12-22")]
alias tendsto_exp_atBot_nhdsWithin := tendsto_exp_atBot_nhdsGT
@[simp]
theorem isBoundedUnder_ge_exp_comp (l : Filter α) (f : α → ℝ) :
IsBoundedUnder (· ≥ ·) l fun x => exp (f x) :=
isBoundedUnder_of ⟨0, fun _ => (exp_pos _).le⟩
@[simp]
theorem isBoundedUnder_le_exp_comp {f : α → ℝ} :
(IsBoundedUnder (· ≤ ·) l fun x => exp (f x)) ↔ IsBoundedUnder (· ≤ ·) l f :=
exp_monotone.isBoundedUnder_le_comp_iff tendsto_exp_atTop
/-- The function `exp(x)/x^n` tends to `+∞` at `+∞`, for any natural number `n` -/
theorem tendsto_exp_div_pow_atTop (n : ℕ) : Tendsto (fun x => exp x / x ^ n) atTop atTop := by
refine (atTop_basis_Ioi.tendsto_iff (atTop_basis' 1)).2 fun C hC₁ => ?_
have hC₀ : 0 < C := zero_lt_one.trans_le hC₁
have : 0 < (exp 1 * C)⁻¹ := inv_pos.2 (mul_pos (exp_pos _) hC₀)
obtain ⟨N, hN⟩ : ∃ N : ℕ, ∀ k ≥ N, (↑k : ℝ) ^ n / exp 1 ^ k < (exp 1 * C)⁻¹ :=
eventually_atTop.1
((tendsto_pow_const_div_const_pow_of_one_lt n (one_lt_exp_iff.2 zero_lt_one)).eventually
(gt_mem_nhds this))
simp only [← exp_nat_mul, mul_one, div_lt_iff₀, exp_pos, ← div_eq_inv_mul] at hN
refine ⟨N, trivial, fun x hx => ?_⟩
rw [Set.mem_Ioi] at hx
have hx₀ : 0 < x := (Nat.cast_nonneg N).trans_lt hx
rw [Set.mem_Ici, le_div_iff₀ (pow_pos hx₀ _), ← le_div_iff₀' hC₀]
calc
x ^ n ≤ ⌈x⌉₊ ^ n := by gcongr; exact Nat.le_ceil _
_ ≤ exp ⌈x⌉₊ / (exp 1 * C) := mod_cast (hN _ (Nat.lt_ceil.2 hx).le).le
_ ≤ exp (x + 1) / (exp 1 * C) := by gcongr; exact (Nat.ceil_lt_add_one hx₀.le).le
_ = exp x / C := by rw [add_comm, exp_add, mul_div_mul_left _ _ (exp_pos _).ne']
/-- The function `x^n * exp(-x)` tends to `0` at `+∞`, for any natural number `n`. -/
theorem tendsto_pow_mul_exp_neg_atTop_nhds_zero (n : ℕ) :
Tendsto (fun x => x ^ n * exp (-x)) atTop (𝓝 0) :=
(tendsto_inv_atTop_zero.comp (tendsto_exp_div_pow_atTop n)).congr fun x => by
rw [comp_apply, inv_eq_one_div, div_div_eq_mul_div, one_mul, div_eq_mul_inv, exp_neg]
/-- The function `(b * exp x + c) / (x ^ n)` tends to `+∞` at `+∞`, for any natural number
`n` and any real numbers `b` and `c` such that `b` is positive. -/
theorem tendsto_mul_exp_add_div_pow_atTop (b c : ℝ) (n : ℕ) (hb : 0 < b) :
Tendsto (fun x => (b * exp x + c) / x ^ n) atTop atTop := by
rcases eq_or_ne n 0 with (rfl | hn)
· simp only [pow_zero, div_one]
exact (tendsto_exp_atTop.const_mul_atTop hb).atTop_add tendsto_const_nhds
simp only [add_div, mul_div_assoc]
exact
((tendsto_exp_div_pow_atTop n).const_mul_atTop hb).atTop_add
(tendsto_const_nhds.div_atTop (tendsto_pow_atTop hn))
/-- The function `(x ^ n) / (b * exp x + c)` tends to `0` at `+∞`, for any natural number
`n` and any real numbers `b` and `c` such that `b` is nonzero. -/
theorem tendsto_div_pow_mul_exp_add_atTop (b c : ℝ) (n : ℕ) (hb : 0 ≠ b) :
Tendsto (fun x => x ^ n / (b * exp x + c)) atTop (𝓝 0) := by
have H : ∀ d e, 0 < d → Tendsto (fun x : ℝ => x ^ n / (d * exp x + e)) atTop (𝓝 0) := by
intro b' c' h
convert (tendsto_mul_exp_add_div_pow_atTop b' c' n h).inv_tendsto_atTop using 1
ext x
simp
rcases lt_or_gt_of_ne hb with h | h
· exact H b c h
· convert (H (-b) (-c) (neg_pos.mpr h)).neg using 1
· ext x
field_simp
rw [← neg_add (b * exp x) c, neg_div_neg_eq]
· rw [neg_zero]
/-- `Real.exp` as an order isomorphism between `ℝ` and `(0, +∞)`. -/
def expOrderIso : ℝ ≃o Ioi (0 : ℝ) :=
StrictMono.orderIsoOfSurjective _ (exp_strictMono.codRestrict exp_pos) <|
(continuous_exp.subtype_mk _).surjective
(by rw [tendsto_Ioi_atTop]; simp only [tendsto_exp_atTop])
(by rw [tendsto_Ioi_atBot]; simp only [tendsto_exp_atBot_nhdsGT])
@[simp]
theorem coe_expOrderIso_apply (x : ℝ) : (expOrderIso x : ℝ) = exp x :=
rfl
@[simp]
theorem coe_comp_expOrderIso : (↑) ∘ expOrderIso = exp :=
rfl
@[simp]
theorem range_exp : range exp = Set.Ioi 0 := by
rw [← coe_comp_expOrderIso, range_comp, expOrderIso.range_eq, image_univ, Subtype.range_coe]
@[simp]
theorem map_exp_atTop : map exp atTop = atTop := by
rw [← coe_comp_expOrderIso, ← Filter.map_map, OrderIso.map_atTop, map_val_Ioi_atTop]
@[simp]
theorem comap_exp_atTop : comap exp atTop = atTop := by
rw [← map_exp_atTop, comap_map exp_injective, map_exp_atTop]
@[simp]
theorem tendsto_exp_comp_atTop {f : α → ℝ} :
Tendsto (fun x => exp (f x)) l atTop ↔ Tendsto f l atTop := by
simp_rw [← comp_apply (f := exp), ← tendsto_comap_iff, comap_exp_atTop]
theorem tendsto_comp_exp_atTop {f : ℝ → α} :
Tendsto (fun x => f (exp x)) atTop l ↔ Tendsto f atTop l := by
simp_rw [← comp_apply (g := exp), ← tendsto_map'_iff, map_exp_atTop]
@[simp]
theorem map_exp_atBot : map exp atBot = 𝓝[>] 0 := by
rw [← coe_comp_expOrderIso, ← Filter.map_map, expOrderIso.map_atBot, ← map_coe_Ioi_atBot]
@[simp]
theorem comap_exp_nhdsGT_zero : comap exp (𝓝[>] 0) = atBot := by
rw [← map_exp_atBot, comap_map exp_injective]
@[deprecated (since := "2024-12-22")]
alias comap_exp_nhdsWithin_Ioi_zero := comap_exp_nhdsGT_zero
theorem tendsto_comp_exp_atBot {f : ℝ → α} :
Tendsto (fun x => f (exp x)) atBot l ↔ Tendsto f (𝓝[>] 0) l := by
rw [← map_exp_atBot, tendsto_map'_iff]
rfl
@[simp]
theorem comap_exp_nhds_zero : comap exp (𝓝 0) = atBot :=
(comap_nhdsWithin_range exp 0).symm.trans <| by simp
@[simp]
theorem tendsto_exp_comp_nhds_zero {f : α → ℝ} :
Tendsto (fun x => exp (f x)) l (𝓝 0) ↔ Tendsto f l atBot := by
simp_rw [← comp_apply (f := exp), ← tendsto_comap_iff, comap_exp_nhds_zero]
theorem isOpenEmbedding_exp : IsOpenEmbedding exp :=
isOpen_Ioi.isOpenEmbedding_subtypeVal.comp expOrderIso.toHomeomorph.isOpenEmbedding
@[simp]
theorem map_exp_nhds (x : ℝ) : map exp (𝓝 x) = 𝓝 (exp x) :=
isOpenEmbedding_exp.map_nhds_eq x
@[simp]
theorem comap_exp_nhds_exp (x : ℝ) : comap exp (𝓝 (exp x)) = 𝓝 x :=
(isOpenEmbedding_exp.nhds_eq_comap x).symm
theorem isLittleO_pow_exp_atTop {n : ℕ} : (fun x : ℝ => x ^ n) =o[atTop] Real.exp := by
simpa [isLittleO_iff_tendsto fun x hx => ((exp_pos x).ne' hx).elim] using
tendsto_div_pow_mul_exp_add_atTop 1 0 n zero_ne_one
@[simp]
theorem isBigO_exp_comp_exp_comp {f g : α → ℝ} :
((fun x => exp (f x)) =O[l] fun x => exp (g x)) ↔ IsBoundedUnder (· ≤ ·) l (f - g) :=
Iff.trans (isBigO_iff_isBoundedUnder_le_div <| Eventually.of_forall fun _ => exp_ne_zero _) <| by
simp only [norm_eq_abs, abs_exp, ← exp_sub, isBoundedUnder_le_exp_comp, Pi.sub_def]
@[simp]
theorem isTheta_exp_comp_exp_comp {f g : α → ℝ} :
((fun x => exp (f x)) =Θ[l] fun x => exp (g x)) ↔
IsBoundedUnder (· ≤ ·) l fun x => |f x - g x| := by
simp only [isBoundedUnder_le_abs, ← isBoundedUnder_le_neg, neg_sub, IsTheta,
isBigO_exp_comp_exp_comp, Pi.sub_def]
@[simp]
theorem isLittleO_exp_comp_exp_comp {f g : α → ℝ} :
((fun x => exp (f x)) =o[l] fun x => exp (g x)) ↔ Tendsto (fun x => g x - f x) l atTop := by
simp only [isLittleO_iff_tendsto, exp_ne_zero, ← exp_sub, ← tendsto_neg_atTop_iff, false_imp_iff,
imp_true_iff, tendsto_exp_comp_nhds_zero, neg_sub]
theorem isLittleO_one_exp_comp {f : α → ℝ} :
((fun _ => 1 : α → ℝ) =o[l] fun x => exp (f x)) ↔ Tendsto f l atTop := by
simp only [← exp_zero, isLittleO_exp_comp_exp_comp, sub_zero]
/-- `Real.exp (f x)` is bounded away from zero along a filter if and only if this filter is bounded
from below under `f`. -/
@[simp]
theorem isBigO_one_exp_comp {f : α → ℝ} :
((fun _ => 1 : α → ℝ) =O[l] fun x => exp (f x)) ↔ IsBoundedUnder (· ≥ ·) l f := by
simp only [← exp_zero, isBigO_exp_comp_exp_comp, Pi.sub_def, zero_sub, isBoundedUnder_le_neg]
/-- `Real.exp (f x)` is bounded away from zero along a filter if and only if this filter is bounded
from below under `f`. -/
theorem isBigO_exp_comp_one {f : α → ℝ} :
(fun x => exp (f x)) =O[l] (fun _ => 1 : α → ℝ) ↔ IsBoundedUnder (· ≤ ·) l f := by
simp only [isBigO_one_iff, norm_eq_abs, abs_exp, isBoundedUnder_le_exp_comp]
/-- `Real.exp (f x)` is bounded away from zero and infinity along a filter `l` if and only if
`|f x|` is bounded from above along this filter. -/
@[simp]
| theorem isTheta_exp_comp_one {f : α → ℝ} :
(fun x => exp (f x)) =Θ[l] (fun _ => 1 : α → ℝ) ↔ IsBoundedUnder (· ≤ ·) l fun x => |f x| := by
simp only [← exp_zero, isTheta_exp_comp_exp_comp, sub_zero]
| Mathlib/Analysis/SpecialFunctions/Exp.lean | 419 | 422 |
/-
Copyright (c) 2019 Kenny Lau. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Kenny Lau
-/
import Mathlib.Algebra.CharP.Defs
import Mathlib.Algebra.GeomSum
import Mathlib.Algebra.MvPolynomial.CommRing
import Mathlib.Algebra.MvPolynomial.Equiv
import Mathlib.Algebra.Polynomial.BigOperators
import Mathlib.RingTheory.Noetherian.Basic
/-!
# Ring-theoretic supplement of Algebra.Polynomial.
## Main results
* `MvPolynomial.isDomain`:
If a ring is an integral domain, then so is its polynomial ring over finitely many variables.
* `Polynomial.isNoetherianRing`:
Hilbert basis theorem, that if a ring is noetherian then so is its polynomial ring.
-/
noncomputable section
open Polynomial
open Finset
universe u v w
variable {R : Type u} {S : Type*}
namespace Polynomial
section Semiring
variable [Semiring R]
instance instCharP (p : ℕ) [h : CharP R p] : CharP R[X] p :=
let ⟨h⟩ := h
⟨fun n => by rw [← map_natCast C, ← C_0, C_inj, h]⟩
instance instExpChar (p : ℕ) [h : ExpChar R p] : ExpChar R[X] p := by
cases h; exacts [ExpChar.zero, ExpChar.prime ‹_›]
variable (R)
/-- The `R`-submodule of `R[X]` consisting of polynomials of degree ≤ `n`. -/
def degreeLE (n : WithBot ℕ) : Submodule R R[X] :=
⨅ k : ℕ, ⨅ _ : ↑k > n, LinearMap.ker (lcoeff R k)
/-- The `R`-submodule of `R[X]` consisting of polynomials of degree < `n`. -/
def degreeLT (n : ℕ) : Submodule R R[X] :=
⨅ k : ℕ, ⨅ (_ : k ≥ n), LinearMap.ker (lcoeff R k)
variable {R}
theorem mem_degreeLE {n : WithBot ℕ} {f : R[X]} : f ∈ degreeLE R n ↔ degree f ≤ n := by
simp only [degreeLE, Submodule.mem_iInf, degree_le_iff_coeff_zero, LinearMap.mem_ker]; rfl
@[mono]
theorem degreeLE_mono {m n : WithBot ℕ} (H : m ≤ n) : degreeLE R m ≤ degreeLE R n := fun _ hf =>
mem_degreeLE.2 (le_trans (mem_degreeLE.1 hf) H)
theorem degreeLE_eq_span_X_pow [DecidableEq R] {n : ℕ} :
degreeLE R n = Submodule.span R ↑((Finset.range (n + 1)).image fun n => (X : R[X]) ^ n) := by
apply le_antisymm
· intro p hp
replace hp := mem_degreeLE.1 hp
rw [← Polynomial.sum_monomial_eq p, Polynomial.sum]
refine Submodule.sum_mem _ fun k hk => ?_
have := WithBot.coe_le_coe.1 (Finset.sup_le_iff.1 hp k hk)
rw [← C_mul_X_pow_eq_monomial, C_mul']
refine
Submodule.smul_mem _ _
(Submodule.subset_span <|
Finset.mem_coe.2 <|
Finset.mem_image.2 ⟨_, Finset.mem_range.2 (Nat.lt_succ_of_le this), rfl⟩)
rw [Submodule.span_le, Finset.coe_image, Set.image_subset_iff]
intro k hk
apply mem_degreeLE.2
exact
(degree_X_pow_le _).trans (WithBot.coe_le_coe.2 <| Nat.le_of_lt_succ <| Finset.mem_range.1 hk)
theorem mem_degreeLT {n : ℕ} {f : R[X]} : f ∈ degreeLT R n ↔ degree f < n := by
rw [degreeLT, Submodule.mem_iInf]
conv_lhs => intro i; rw [Submodule.mem_iInf]
rw [degree, Finset.max_eq_sup_coe]
rw [Finset.sup_lt_iff ?_]
rotate_left
· apply WithBot.bot_lt_coe
conv_rhs =>
simp only [mem_support_iff]
intro b
rw [Nat.cast_withBot, WithBot.coe_lt_coe, lt_iff_not_le, Ne, not_imp_not]
rfl
@[mono]
theorem degreeLT_mono {m n : ℕ} (H : m ≤ n) : degreeLT R m ≤ degreeLT R n := fun _ hf =>
mem_degreeLT.2 (lt_of_lt_of_le (mem_degreeLT.1 hf) <| WithBot.coe_le_coe.2 H)
theorem degreeLT_eq_span_X_pow [DecidableEq R] {n : ℕ} :
degreeLT R n = Submodule.span R ↑((Finset.range n).image fun n => X ^ n : Finset R[X]) := by
apply le_antisymm
· intro p hp
replace hp := mem_degreeLT.1 hp
rw [← Polynomial.sum_monomial_eq p, Polynomial.sum]
refine Submodule.sum_mem _ fun k hk => ?_
have := WithBot.coe_lt_coe.1 ((Finset.sup_lt_iff <| WithBot.bot_lt_coe n).1 hp k hk)
rw [← C_mul_X_pow_eq_monomial, C_mul']
refine
Submodule.smul_mem _ _
(Submodule.subset_span <|
Finset.mem_coe.2 <| Finset.mem_image.2 ⟨_, Finset.mem_range.2 this, rfl⟩)
rw [Submodule.span_le, Finset.coe_image, Set.image_subset_iff]
intro k hk
apply mem_degreeLT.2
exact lt_of_le_of_lt (degree_X_pow_le _) (WithBot.coe_lt_coe.2 <| Finset.mem_range.1 hk)
/-- The first `n` coefficients on `degreeLT n` form a linear equivalence with `Fin n → R`. -/
def degreeLTEquiv (R) [Semiring R] (n : ℕ) : degreeLT R n ≃ₗ[R] Fin n → R where
toFun p n := (↑p : R[X]).coeff n
invFun f :=
⟨∑ i : Fin n, monomial i (f i),
(degreeLT R n).sum_mem fun i _ =>
mem_degreeLT.mpr
(lt_of_le_of_lt (degree_monomial_le i (f i)) (WithBot.coe_lt_coe.mpr i.is_lt))⟩
map_add' p q := by
ext
dsimp
rw [coeff_add]
map_smul' x p := by
ext
dsimp
rw [coeff_smul]
rfl
left_inv := by
rintro ⟨p, hp⟩
ext1
simp only [Submodule.coe_mk]
by_cases hp0 : p = 0
· subst hp0
simp only [coeff_zero, LinearMap.map_zero, Finset.sum_const_zero]
rw [mem_degreeLT, degree_eq_natDegree hp0, Nat.cast_lt] at hp
conv_rhs => rw [p.as_sum_range' n hp, ← Fin.sum_univ_eq_sum_range]
right_inv f := by
ext i
simp only [finset_sum_coeff, Submodule.coe_mk]
rw [Finset.sum_eq_single i, coeff_monomial, if_pos rfl]
· rintro j - hji
rw [coeff_monomial, if_neg]
rwa [← Fin.ext_iff]
· intro h
exact (h (Finset.mem_univ _)).elim
theorem degreeLTEquiv_eq_zero_iff_eq_zero {n : ℕ} {p : R[X]} (hp : p ∈ degreeLT R n) :
degreeLTEquiv _ _ ⟨p, hp⟩ = 0 ↔ p = 0 := by simp
theorem eval_eq_sum_degreeLTEquiv {n : ℕ} {p : R[X]} (hp : p ∈ degreeLT R n) (x : R) :
p.eval x = ∑ i, degreeLTEquiv _ _ ⟨p, hp⟩ i * x ^ (i : ℕ) := by
simp_rw [eval_eq_sum]
exact (sum_fin _ (by simp_rw [zero_mul, forall_const]) (mem_degreeLT.mp hp)).symm
theorem degreeLT_succ_eq_degreeLE {n : ℕ} : degreeLT R (n + 1) = degreeLE R n := by
ext x
by_cases x_zero : x = 0
· simp_rw [x_zero, Submodule.zero_mem]
· rw [mem_degreeLT, mem_degreeLE, ← natDegree_lt_iff_degree_lt (by rwa [ne_eq]),
← natDegree_le_iff_degree_le, Nat.lt_succ]
/-- The equivalence between monic polynomials of degree `n` and polynomials of degree less than
`n`, formed by adding a term `X ^ n`. -/
def monicEquivDegreeLT [Nontrivial R] (n : ℕ) :
{ p : R[X] // p.Monic ∧ p.natDegree = n } ≃ degreeLT R n where
toFun p := ⟨p.1.eraseLead, by
rcases p with ⟨p, hp, rfl⟩
simp only [mem_degreeLT]
refine lt_of_lt_of_le ?_ degree_le_natDegree
exact degree_eraseLead_lt (ne_zero_of_ne_zero_of_monic one_ne_zero hp)⟩
invFun := fun p =>
⟨X^n + p.1, monic_X_pow_add (mem_degreeLT.1 p.2), by
rw [natDegree_add_eq_left_of_degree_lt]
· simp
· simp [mem_degreeLT.1 p.2]⟩
left_inv := by
rintro ⟨p, hp, rfl⟩
ext1
simp only
conv_rhs => rw [← eraseLead_add_C_mul_X_pow p]
simp [Monic.def.1 hp, add_comm]
right_inv := by
rintro ⟨p, hp⟩
ext1
simp only
rw [eraseLead_add_of_degree_lt_left]
· simp
· simp [mem_degreeLT.1 hp]
/-- For every polynomial `p` in the span of a set `s : Set R[X]`, there exists a polynomial of
`p' ∈ s` with higher degree. See also `Polynomial.exists_degree_le_of_mem_span_of_finite`. -/
theorem exists_degree_le_of_mem_span {s : Set R[X]} {p : R[X]}
(hs : s.Nonempty) (hp : p ∈ Submodule.span R s) :
∃ p' ∈ s, degree p ≤ degree p' := by
by_contra! h
by_cases hp_zero : p = 0
· rw [hp_zero, degree_zero] at h
rcases hs with ⟨x, hx⟩
exact not_lt_bot (h x hx)
· have : p ∈ degreeLT R (natDegree p) := by
refine (Submodule.span_le.mpr fun p' p'_mem => ?_) hp
rw [SetLike.mem_coe, mem_degreeLT, Nat.cast_withBot]
exact lt_of_lt_of_le (h p' p'_mem) degree_le_natDegree
rwa [mem_degreeLT, Nat.cast_withBot, degree_eq_natDegree hp_zero,
Nat.cast_withBot, lt_self_iff_false] at this
/-- A stronger version of `Polynomial.exists_degree_le_of_mem_span` under the assumption that the
set `s : R[X]` is finite. There exists a polynomial `p' ∈ s` whose degree dominates the degree of
every element of `p ∈ span R s`. -/
theorem exists_degree_le_of_mem_span_of_finite {s : Set R[X]} (s_fin : s.Finite) (hs : s.Nonempty) :
∃ p' ∈ s, ∀ (p : R[X]), p ∈ Submodule.span R s → degree p ≤ degree p' := by
rcases Set.Finite.exists_maximal_wrt degree s s_fin hs with ⟨a, has, hmax⟩
refine ⟨a, has, fun p hp => ?_⟩
rcases exists_degree_le_of_mem_span hs hp with ⟨p', hp'⟩
by_cases h : degree a ≤ degree p'
· rw [← hmax p' hp'.left h] at hp'; exact hp'.right
· exact le_trans hp'.right (not_le.mp h).le
/-- The span of every finite set of polynomials is contained in a `degreeLE n` for some `n`. -/
theorem span_le_degreeLE_of_finite {s : Set R[X]} (s_fin : s.Finite) :
∃ n : ℕ, Submodule.span R s ≤ degreeLE R n := by
by_cases s_emp : s.Nonempty
· rcases exists_degree_le_of_mem_span_of_finite s_fin s_emp with ⟨p', _, hp'max⟩
exact ⟨natDegree p', fun p hp => mem_degreeLE.mpr ((hp'max _ hp).trans degree_le_natDegree)⟩
· rw [Set.not_nonempty_iff_eq_empty] at s_emp
rw [s_emp, Submodule.span_empty]
exact ⟨0, bot_le⟩
/-- The span of every finite set of polynomials is contained in a `degreeLT n` for some `n`. -/
theorem span_of_finite_le_degreeLT {s : Set R[X]} (s_fin : s.Finite) :
∃ n : ℕ, Submodule.span R s ≤ degreeLT R n := by
rcases span_le_degreeLE_of_finite s_fin with ⟨n, _⟩
exact ⟨n + 1, by rwa [degreeLT_succ_eq_degreeLE]⟩
/-- If `R` is a nontrivial ring, the polynomials `R[X]` are not finite as an `R`-module. When `R` is
a field, this is equivalent to `R[X]` being an infinite-dimensional vector space over `R`. -/
theorem not_finite [Nontrivial R] : ¬ Module.Finite R R[X] := by
rw [Module.finite_def, Submodule.fg_def]
push_neg
intro s hs contra
rcases span_le_degreeLE_of_finite hs with ⟨n,hn⟩
have : ((X : R[X]) ^ (n + 1)) ∈ Polynomial.degreeLE R ↑n := by
rw [contra] at hn
exact hn Submodule.mem_top
rw [mem_degreeLE, degree_X_pow, Nat.cast_le, add_le_iff_nonpos_right, nonpos_iff_eq_zero] at this
exact one_ne_zero this
theorem geom_sum_X_comp_X_add_one_eq_sum (n : ℕ) :
(∑ i ∈ range n, (X : R[X]) ^ i).comp (X + 1) =
(Finset.range n).sum fun i : ℕ => (n.choose (i + 1) : R[X]) * X ^ i := by
ext i
trans (n.choose (i + 1) : R); swap
· simp only [finset_sum_coeff, ← C_eq_natCast, coeff_C_mul_X_pow]
rw [Finset.sum_eq_single i, if_pos rfl]
· simp +contextual only [@eq_comm _ i, if_false, eq_self_iff_true,
imp_true_iff]
· simp +contextual only [Nat.lt_add_one_iff, Nat.choose_eq_zero_of_lt,
Nat.cast_zero, Finset.mem_range, not_lt, eq_self_iff_true, if_true, imp_true_iff]
induction' n with n ih generalizing i
· dsimp; simp only [zero_comp, coeff_zero, Nat.cast_zero]
· simp only [geom_sum_succ', ih, add_comp, X_pow_comp, coeff_add, Nat.choose_succ_succ,
Nat.cast_add, coeff_X_add_one_pow]
theorem Monic.geom_sum {P : R[X]} (hP : P.Monic) (hdeg : 0 < P.natDegree) {n : ℕ} (hn : n ≠ 0) :
(∑ i ∈ range n, P ^ i).Monic := by
nontriviality R
obtain ⟨n, rfl⟩ := Nat.exists_eq_succ_of_ne_zero hn
rw [geom_sum_succ']
refine (hP.pow _).add_of_left ?_
refine lt_of_le_of_lt (degree_sum_le _ _) ?_
rw [Finset.sup_lt_iff]
· simp only [Finset.mem_range, degree_eq_natDegree (hP.pow _).ne_zero]
simp only [Nat.cast_lt, hP.natDegree_pow]
intro k
exact nsmul_lt_nsmul_left hdeg
· rw [bot_lt_iff_ne_bot, Ne, degree_eq_bot]
exact (hP.pow _).ne_zero
theorem Monic.geom_sum' {P : R[X]} (hP : P.Monic) (hdeg : 0 < P.degree) {n : ℕ} (hn : n ≠ 0) :
(∑ i ∈ range n, P ^ i).Monic :=
hP.geom_sum (natDegree_pos_iff_degree_pos.2 hdeg) hn
theorem monic_geom_sum_X {n : ℕ} (hn : n ≠ 0) : (∑ i ∈ range n, (X : R[X]) ^ i).Monic := by
nontriviality R
apply monic_X.geom_sum _ hn
simp only [natDegree_X, zero_lt_one]
end Semiring
section Ring
variable [Ring R]
/-- Given a polynomial, return the polynomial whose coefficients are in
the ring closure of the original coefficients. -/
def restriction (p : R[X]) : Polynomial (Subring.closure (↑p.coeffs : Set R)) :=
∑ i ∈ p.support,
monomial i
(⟨p.coeff i,
letI := Classical.decEq R
if H : p.coeff i = 0 then H.symm ▸ (Subring.closure _).zero_mem
else Subring.subset_closure (p.coeff_mem_coeffs _ H)⟩ :
Subring.closure (↑p.coeffs : Set R))
@[simp]
theorem coeff_restriction {p : R[X]} {n : ℕ} : ↑(coeff (restriction p) n) = coeff p n := by
classical
simp only [restriction, coeff_monomial, finset_sum_coeff, mem_support_iff, Finset.sum_ite_eq',
Ne, ite_not]
split_ifs with h
· rw [h]
rfl
· rfl
theorem coeff_restriction' {p : R[X]} {n : ℕ} : (coeff (restriction p) n).1 = coeff p n := by
simp
@[simp]
theorem support_restriction (p : R[X]) : support (restriction p) = support p := by
ext i
simp only [mem_support_iff, not_iff_not, Ne]
conv_rhs => rw [← coeff_restriction]
exact ⟨fun H => by rw [H, ZeroMemClass.coe_zero], fun H => Subtype.coe_injective H⟩
@[simp]
theorem map_restriction {R : Type u} [CommRing R] (p : R[X]) :
p.restriction.map (algebraMap _ _) = p :=
ext fun n => by rw [coeff_map, Algebra.algebraMap_ofSubring_apply, coeff_restriction]
@[simp]
theorem degree_restriction {p : R[X]} : (restriction p).degree = p.degree := by simp [degree]
@[simp]
theorem natDegree_restriction {p : R[X]} : (restriction p).natDegree = p.natDegree := by
simp [natDegree]
@[simp]
theorem monic_restriction {p : R[X]} : Monic (restriction p) ↔ Monic p := by
simp only [Monic, leadingCoeff, natDegree_restriction]
rw [← @coeff_restriction _ _ p]
exact ⟨fun H => by rw [H, OneMemClass.coe_one], fun H => Subtype.coe_injective H⟩
@[simp]
theorem restriction_zero : restriction (0 : R[X]) = 0 := by
simp only [restriction, Finset.sum_empty, support_zero]
@[simp]
theorem restriction_one : restriction (1 : R[X]) = 1 :=
ext fun i => Subtype.eq <| by rw [coeff_restriction', coeff_one, coeff_one]; split_ifs <;> rfl
variable [Semiring S] {f : R →+* S} {x : S}
theorem eval₂_restriction {p : R[X]} :
eval₂ f x p =
eval₂ (f.comp (Subring.subtype (Subring.closure (p.coeffs : Set R)))) x p.restriction := by
simp only [eval₂_eq_sum, sum, support_restriction, ← @coeff_restriction _ _ p, RingHom.comp_apply,
Subring.coe_subtype]
section ToSubring
variable (p : R[X]) (T : Subring R)
/-- Given a polynomial `p` and a subring `T` that contains the coefficients of `p`,
return the corresponding polynomial whose coefficients are in `T`. -/
def toSubring (hp : (↑p.coeffs : Set R) ⊆ T) : T[X] :=
∑ i ∈ p.support,
monomial i
(⟨p.coeff i,
letI := Classical.decEq R
if H : p.coeff i = 0 then H.symm ▸ T.zero_mem else hp (p.coeff_mem_coeffs _ H)⟩ : T)
variable (hp : (↑p.coeffs : Set R) ⊆ T)
@[simp]
theorem coeff_toSubring {n : ℕ} : ↑(coeff (toSubring p T hp) n) = coeff p n := by
classical
simp only [toSubring, coeff_monomial, finset_sum_coeff, mem_support_iff, Finset.sum_ite_eq',
Ne, ite_not]
split_ifs with h
· rw [h]
rfl
· rfl
theorem coeff_toSubring' {n : ℕ} : (coeff (toSubring p T hp) n).1 = coeff p n := by
simp
@[simp]
theorem support_toSubring : support (toSubring p T hp) = support p := by
ext i
simp only [mem_support_iff, not_iff_not, Ne]
conv_rhs => rw [← coeff_toSubring p T hp]
exact ⟨fun H => by rw [H, ZeroMemClass.coe_zero], fun H => Subtype.coe_injective H⟩
@[simp]
theorem degree_toSubring : (toSubring p T hp).degree = p.degree := by simp [degree]
@[simp]
theorem natDegree_toSubring : (toSubring p T hp).natDegree = p.natDegree := by simp [natDegree]
@[simp]
theorem monic_toSubring : Monic (toSubring p T hp) ↔ Monic p := by
simp_rw [Monic, leadingCoeff, natDegree_toSubring, ← coeff_toSubring p T hp]
exact ⟨fun H => by rw [H, OneMemClass.coe_one], fun H => Subtype.coe_injective H⟩
@[simp]
theorem toSubring_zero : toSubring (0 : R[X]) T (by simp [coeffs]) = 0 := by
ext i
simp
@[simp]
theorem toSubring_one :
toSubring (1 : R[X]) T
(Set.Subset.trans coeffs_one <| Finset.singleton_subset_set_iff.2 T.one_mem) =
1 :=
ext fun i => Subtype.eq <| by
rw [coeff_toSubring', coeff_one, coeff_one, apply_ite Subtype.val, ZeroMemClass.coe_zero,
OneMemClass.coe_one]
@[simp]
theorem map_toSubring : (p.toSubring T hp).map (Subring.subtype T) = p := by
ext n
simp [coeff_map]
end ToSubring
variable (T : Subring R)
/-- Given a polynomial whose coefficients are in some subring, return
the corresponding polynomial whose coefficients are in the ambient ring. -/
def ofSubring (p : T[X]) : R[X] :=
∑ i ∈ p.support, monomial i (p.coeff i : R)
theorem coeff_ofSubring (p : T[X]) (n : ℕ) : coeff (ofSubring T p) n = (coeff p n : T) := by
simp only [ofSubring, coeff_monomial, finset_sum_coeff, mem_support_iff, Finset.sum_ite_eq',
ite_eq_right_iff, Ne, ite_not, Classical.not_not, ite_eq_left_iff]
intro h
rw [h, ZeroMemClass.coe_zero]
@[simp]
theorem coeffs_ofSubring {p : T[X]} : (↑(p.ofSubring T).coeffs : Set R) ⊆ T := by
classical
intro i hi
simp only [coeffs, Set.mem_image, mem_support_iff, Ne, Finset.mem_coe,
(Finset.coe_image)] at hi
rcases hi with ⟨n, _, h'n⟩
rw [← h'n, coeff_ofSubring]
exact Subtype.mem (coeff p n : T)
end Ring
end Polynomial
namespace Ideal
open Polynomial
section Semiring
variable [Semiring R]
/-- Transport an ideal of `R[X]` to an `R`-submodule of `R[X]`. -/
| def ofPolynomial (I : Ideal R[X]) : Submodule R R[X] where
carrier := I.carrier
zero_mem' := I.zero_mem
| Mathlib/RingTheory/Polynomial/Basic.lean | 471 | 473 |
/-
Copyright (c) 2022 Kexing Ying. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Kexing Ying
-/
import Mathlib.Order.Interval.Set.Monotone
import Mathlib.Probability.Process.HittingTime
import Mathlib.Probability.Martingale.Basic
import Mathlib.Tactic.AdaptationNote
/-!
# Doob's upcrossing estimate
Given a discrete real-valued submartingale $(f_n)_{n \in \mathbb{N}}$, denoting by $U_N(a, b)$ the
number of times $f_n$ crossed from below $a$ to above $b$ before time $N$, Doob's upcrossing
estimate (also known as Doob's inequality) states that
$$(b - a) \mathbb{E}[U_N(a, b)] \le \mathbb{E}[(f_N - a)^+].$$
Doob's upcrossing estimate is an important inequality and is central in proving the martingale
convergence theorems.
## Main definitions
* `MeasureTheory.upperCrossingTime a b f N n`: is the stopping time corresponding to `f`
crossing above `b` the `n`-th time before time `N` (if this does not occur then the value is
taken to be `N`).
* `MeasureTheory.lowerCrossingTime a b f N n`: is the stopping time corresponding to `f`
crossing below `a` the `n`-th time before time `N` (if this does not occur then the value is
taken to be `N`).
* `MeasureTheory.upcrossingStrat a b f N`: is the predictable process which is 1 if `n` is
between a consecutive pair of lower and upper crossings and is 0 otherwise. Intuitively
one might think of the `upcrossingStrat` as the strategy of buying 1 share whenever the process
crosses below `a` for the first time after selling and selling 1 share whenever the process
crosses above `b` for the first time after buying.
* `MeasureTheory.upcrossingsBefore a b f N`: is the number of times `f` crosses from below `a` to
above `b` before time `N`.
* `MeasureTheory.upcrossings a b f`: is the number of times `f` crosses from below `a` to above
`b`. This takes value in `ℝ≥0∞` and so is allowed to be `∞`.
## Main results
* `MeasureTheory.Adapted.isStoppingTime_upperCrossingTime`: `upperCrossingTime` is a
stopping time whenever the process it is associated to is adapted.
* `MeasureTheory.Adapted.isStoppingTime_lowerCrossingTime`: `lowerCrossingTime` is a
stopping time whenever the process it is associated to is adapted.
* `MeasureTheory.Submartingale.mul_integral_upcrossingsBefore_le_integral_pos_part`: Doob's
upcrossing estimate.
* `MeasureTheory.Submartingale.mul_lintegral_upcrossings_le_lintegral_pos_part`: the inequality
obtained by taking the supremum on both sides of Doob's upcrossing estimate.
### References
We mostly follow the proof from [Kallenberg, *Foundations of modern probability*][kallenberg2021]
-/
open TopologicalSpace Filter
open scoped NNReal ENNReal MeasureTheory ProbabilityTheory Topology
namespace MeasureTheory
variable {Ω ι : Type*} {m0 : MeasurableSpace Ω} {μ : Measure Ω}
/-!
## Proof outline
In this section, we will denote by $U_N(a, b)$ the number of upcrossings of $(f_n)$ from below $a$
to above $b$ before time $N$.
To define $U_N(a, b)$, we will construct two stopping times corresponding to when $(f_n)$ crosses
below $a$ and above $b$. Namely, we define
$$
\sigma_n := \inf \{n \ge \tau_n \mid f_n \le a\} \wedge N;
$$
$$
\tau_{n + 1} := \inf \{n \ge \sigma_n \mid f_n \ge b\} \wedge N.
$$
These are `lowerCrossingTime` and `upperCrossingTime` in our formalization which are defined
using `MeasureTheory.hitting` allowing us to specify a starting and ending time.
Then, we may simply define $U_N(a, b) := \sup \{n \mid \tau_n < N\}$.
Fixing $a < b \in \mathbb{R}$, we will first prove the theorem in the special case that
$0 \le f_0$ and $a \le f_N$. In particular, we will show
$$
(b - a) \mathbb{E}[U_N(a, b)] \le \mathbb{E}[f_N].
$$
This is `MeasureTheory.integral_mul_upcrossingsBefore_le_integral` in our formalization.
To prove this, we use the fact that given a non-negative, bounded, predictable process $(C_n)$
(i.e. $(C_{n + 1})$ is adapted), $(C \bullet f)_n := \sum_{k \le n} C_{k + 1}(f_{k + 1} - f_k)$ is
a submartingale if $(f_n)$ is.
Define $C_n := \sum_{k \le n} \mathbf{1}_{[\sigma_k, \tau_{k + 1})}(n)$. It is easy to see that
$(1 - C_n)$ is non-negative, bounded and predictable, and hence, given a submartingale $(f_n)$,
$(1 - C) \bullet f$ is also a submartingale. Thus, by the submartingale property,
$0 \le \mathbb{E}[((1 - C) \bullet f)_0] \le \mathbb{E}[((1 - C) \bullet f)_N]$ implying
$$
\mathbb{E}[(C \bullet f)_N] \le \mathbb{E}[(1 \bullet f)_N] = \mathbb{E}[f_N] - \mathbb{E}[f_0].
$$
Furthermore,
\begin{align}
(C \bullet f)_N & =
\sum_{n \le N} \sum_{k \le N} \mathbf{1}_{[\sigma_k, \tau_{k + 1})}(n)(f_{n + 1} - f_n)\\
& = \sum_{k \le N} \sum_{n \le N} \mathbf{1}_{[\sigma_k, \tau_{k + 1})}(n)(f_{n + 1} - f_n)\\
& = \sum_{k \le N} (f_{\sigma_k + 1} - f_{\sigma_k} + f_{\sigma_k + 2} - f_{\sigma_k + 1}
+ \cdots + f_{\tau_{k + 1}} - f_{\tau_{k + 1} - 1})\\
& = \sum_{k \le N} (f_{\tau_{k + 1}} - f_{\sigma_k})
\ge \sum_{k < U_N(a, b)} (b - a) = (b - a) U_N(a, b)
\end{align}
where the inequality follows since for all $k < U_N(a, b)$,
$f_{\tau_{k + 1}} - f_{\sigma_k} \ge b - a$ while for all $k > U_N(a, b)$,
$f_{\tau_{k + 1}} = f_{\sigma_k} = f_N$ and
$f_{\tau_{U_N(a, b) + 1}} - f_{\sigma_{U_N(a, b)}} = f_N - a \ge 0$. Hence, we have
$$
(b - a) \mathbb{E}[U_N(a, b)] \le \mathbb{E}[(C \bullet f)_N]
\le \mathbb{E}[f_N] - \mathbb{E}[f_0] \le \mathbb{E}[f_N],
$$
as required.
To obtain the general case, we simply apply the above to $((f_n - a)^+)_n$.
-/
/-- `lowerCrossingTimeAux a f c N` is the first time `f` reached below `a` after time `c` before
time `N`. -/
noncomputable def lowerCrossingTimeAux [Preorder ι] [InfSet ι] (a : ℝ) (f : ι → Ω → ℝ) (c N : ι) :
Ω → ι :=
hitting f (Set.Iic a) c N
/-- `upperCrossingTime a b f N n` is the first time before time `N`, `f` reaches
above `b` after `f` reached below `a` for the `n - 1`-th time. -/
noncomputable def upperCrossingTime [Preorder ι] [OrderBot ι] [InfSet ι] (a b : ℝ) (f : ι → Ω → ℝ)
(N : ι) : ℕ → Ω → ι
| 0 => ⊥
| n + 1 => fun ω =>
hitting f (Set.Ici b) (lowerCrossingTimeAux a f (upperCrossingTime a b f N n ω) N ω) N ω
/-- `lowerCrossingTime a b f N n` is the first time before time `N`, `f` reaches
below `a` after `f` reached above `b` for the `n`-th time. -/
noncomputable def lowerCrossingTime [Preorder ι] [OrderBot ι] [InfSet ι] (a b : ℝ) (f : ι → Ω → ℝ)
(N : ι) (n : ℕ) : Ω → ι := fun ω => hitting f (Set.Iic a) (upperCrossingTime a b f N n ω) N ω
section
variable [Preorder ι] [OrderBot ι] [InfSet ι]
variable {a b : ℝ} {f : ι → Ω → ℝ} {N : ι} {n : ℕ} {ω : Ω}
@[simp]
theorem upperCrossingTime_zero : upperCrossingTime a b f N 0 = ⊥ :=
rfl
@[simp]
theorem lowerCrossingTime_zero : lowerCrossingTime a b f N 0 = hitting f (Set.Iic a) ⊥ N :=
rfl
theorem upperCrossingTime_succ : upperCrossingTime a b f N (n + 1) ω =
hitting f (Set.Ici b) (lowerCrossingTimeAux a f (upperCrossingTime a b f N n ω) N ω) N ω := by
rw [upperCrossingTime]
theorem upperCrossingTime_succ_eq (ω : Ω) : upperCrossingTime a b f N (n + 1) ω =
hitting f (Set.Ici b) (lowerCrossingTime a b f N n ω) N ω := by
simp only [upperCrossingTime_succ]
rfl
end
section ConditionallyCompleteLinearOrderBot
variable [ConditionallyCompleteLinearOrderBot ι]
variable {a b : ℝ} {f : ι → Ω → ℝ} {N : ι} {n m : ℕ} {ω : Ω}
theorem upperCrossingTime_le : upperCrossingTime a b f N n ω ≤ N := by
cases n
· simp only [upperCrossingTime_zero, Pi.bot_apply, bot_le]
· simp only [upperCrossingTime_succ, hitting_le]
@[simp]
theorem upperCrossingTime_zero' : upperCrossingTime a b f ⊥ n ω = ⊥ :=
eq_bot_iff.2 upperCrossingTime_le
theorem lowerCrossingTime_le : lowerCrossingTime a b f N n ω ≤ N := by
simp only [lowerCrossingTime, hitting_le ω]
theorem upperCrossingTime_le_lowerCrossingTime :
upperCrossingTime a b f N n ω ≤ lowerCrossingTime a b f N n ω := by
simp only [lowerCrossingTime, le_hitting upperCrossingTime_le ω]
theorem lowerCrossingTime_le_upperCrossingTime_succ :
lowerCrossingTime a b f N n ω ≤ upperCrossingTime a b f N (n + 1) ω := by
rw [upperCrossingTime_succ]
exact le_hitting lowerCrossingTime_le ω
theorem lowerCrossingTime_mono (hnm : n ≤ m) :
lowerCrossingTime a b f N n ω ≤ lowerCrossingTime a b f N m ω := by
suffices Monotone fun n => lowerCrossingTime a b f N n ω by exact this hnm
exact monotone_nat_of_le_succ fun n =>
le_trans lowerCrossingTime_le_upperCrossingTime_succ upperCrossingTime_le_lowerCrossingTime
theorem upperCrossingTime_mono (hnm : n ≤ m) :
upperCrossingTime a b f N n ω ≤ upperCrossingTime a b f N m ω := by
suffices Monotone fun n => upperCrossingTime a b f N n ω by exact this hnm
exact monotone_nat_of_le_succ fun n =>
le_trans upperCrossingTime_le_lowerCrossingTime lowerCrossingTime_le_upperCrossingTime_succ
end ConditionallyCompleteLinearOrderBot
variable {a b : ℝ} {f : ℕ → Ω → ℝ} {N : ℕ} {n m : ℕ} {ω : Ω}
theorem stoppedValue_lowerCrossingTime (h : lowerCrossingTime a b f N n ω ≠ N) :
stoppedValue f (lowerCrossingTime a b f N n) ω ≤ a := by
obtain ⟨j, hj₁, hj₂⟩ := (hitting_le_iff_of_lt _ (lt_of_le_of_ne lowerCrossingTime_le h)).1 le_rfl
exact stoppedValue_hitting_mem ⟨j, ⟨hj₁.1, le_trans hj₁.2 lowerCrossingTime_le⟩, hj₂⟩
theorem stoppedValue_upperCrossingTime (h : upperCrossingTime a b f N (n + 1) ω ≠ N) :
b ≤ stoppedValue f (upperCrossingTime a b f N (n + 1)) ω := by
obtain ⟨j, hj₁, hj₂⟩ := (hitting_le_iff_of_lt _ (lt_of_le_of_ne upperCrossingTime_le h)).1 le_rfl
exact stoppedValue_hitting_mem ⟨j, ⟨hj₁.1, le_trans hj₁.2 (hitting_le _)⟩, hj₂⟩
theorem upperCrossingTime_lt_lowerCrossingTime (hab : a < b)
(hn : lowerCrossingTime a b f N (n + 1) ω ≠ N) :
upperCrossingTime a b f N (n + 1) ω < lowerCrossingTime a b f N (n + 1) ω := by
refine lt_of_le_of_ne upperCrossingTime_le_lowerCrossingTime fun h =>
not_le.2 hab <| le_trans ?_ (stoppedValue_lowerCrossingTime hn)
simp only [stoppedValue]
| rw [← h]
exact stoppedValue_upperCrossingTime (h.symm ▸ hn)
theorem lowerCrossingTime_lt_upperCrossingTime (hab : a < b)
| Mathlib/Probability/Martingale/Upcrossing.lean | 230 | 233 |
/-
Copyright (c) 2015 Microsoft Corporation. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Leonardo de Moura, Mario Carneiro
-/
import Mathlib.Data.Sum.Basic
import Mathlib.Logic.Equiv.Option
import Mathlib.Logic.Equiv.Sum
import Mathlib.Logic.Function.Conjugate
import Mathlib.Tactic.CC
import Mathlib.Tactic.Lift
/-!
# Equivalence between types
In this file we continue the work on equivalences begun in `Mathlib/Logic/Equiv/Defs.lean`, defining
a lot of equivalences between various types and operations on these equivalences.
More definitions of this kind can be found in other files.
E.g., `Mathlib/Algebra/Equiv/TransferInstance.lean` does it for many algebraic type classes like
`Group`, `Module`, etc.
## Tags
equivalence, congruence, bijective map
-/
universe u v w z
open Function
-- Unless required to be `Type*`, all variables in this file are `Sort*`
variable {α α₁ α₂ β β₁ β₂ γ δ : Sort*}
namespace Equiv
/-- The product over `Option α` of `β a` is the binary product of the
product over `α` of `β (some α)` and `β none` -/
@[simps]
def piOptionEquivProd {α} {β : Option α → Type*} :
(∀ a : Option α, β a) ≃ β none × ∀ a : α, β (some a) where
toFun f := (f none, fun a => f (some a))
invFun x a := Option.casesOn a x.fst x.snd
left_inv f := funext fun a => by cases a <;> rfl
right_inv x := by simp
section subtypeCongr
/-- Combines an `Equiv` between two subtypes with an `Equiv` between their complements to form a
permutation. -/
def subtypeCongr {α} {p q : α → Prop} [DecidablePred p] [DecidablePred q]
(e : { x // p x } ≃ { x // q x }) (f : { x // ¬p x } ≃ { x // ¬q x }) : Perm α :=
(sumCompl p).symm.trans ((sumCongr e f).trans (sumCompl q))
variable {ε : Type*} {p : ε → Prop} [DecidablePred p]
variable (ep ep' : Perm { a // p a }) (en en' : Perm { a // ¬p a })
/-- Combining permutations on `ε` that permute only inside or outside the subtype
split induced by `p : ε → Prop` constructs a permutation on `ε`. -/
def Perm.subtypeCongr : Equiv.Perm ε :=
permCongr (sumCompl p) (sumCongr ep en)
theorem Perm.subtypeCongr.apply (a : ε) : ep.subtypeCongr en a =
if h : p a then (ep ⟨a, h⟩ : ε) else en ⟨a, h⟩ := by
by_cases h : p a <;> simp [Perm.subtypeCongr, h]
@[simp]
theorem Perm.subtypeCongr.left_apply {a : ε} (h : p a) : ep.subtypeCongr en a = ep ⟨a, h⟩ := by
simp [Perm.subtypeCongr.apply, h]
@[simp]
theorem Perm.subtypeCongr.left_apply_subtype (a : { a // p a }) : ep.subtypeCongr en a = ep a :=
Perm.subtypeCongr.left_apply ep en a.property
@[simp]
theorem Perm.subtypeCongr.right_apply {a : ε} (h : ¬p a) : ep.subtypeCongr en a = en ⟨a, h⟩ := by
simp [Perm.subtypeCongr.apply, h]
@[simp]
theorem Perm.subtypeCongr.right_apply_subtype (a : { a // ¬p a }) : ep.subtypeCongr en a = en a :=
Perm.subtypeCongr.right_apply ep en a.property
@[simp]
theorem Perm.subtypeCongr.refl :
Perm.subtypeCongr (Equiv.refl { a // p a }) (Equiv.refl { a // ¬p a }) = Equiv.refl ε := by
ext x
by_cases h : p x <;> simp [h]
@[simp]
theorem Perm.subtypeCongr.symm : (ep.subtypeCongr en).symm = Perm.subtypeCongr ep.symm en.symm := by
ext x
by_cases h : p x
· have : p (ep.symm ⟨x, h⟩) := Subtype.property _
simp [Perm.subtypeCongr.apply, h, symm_apply_eq, this]
· have : ¬p (en.symm ⟨x, h⟩) := Subtype.property (en.symm _)
simp [Perm.subtypeCongr.apply, h, symm_apply_eq, this]
@[simp]
theorem Perm.subtypeCongr.trans :
(ep.subtypeCongr en).trans (ep'.subtypeCongr en')
= Perm.subtypeCongr (ep.trans ep') (en.trans en') := by
ext x
by_cases h : p x
· have : p (ep ⟨x, h⟩) := Subtype.property _
simp [Perm.subtypeCongr.apply, h, this]
· have : ¬p (en ⟨x, h⟩) := Subtype.property (en _)
simp [Perm.subtypeCongr.apply, h, symm_apply_eq, this]
end subtypeCongr
section subtypePreimage
variable (p : α → Prop) [DecidablePred p] (x₀ : { a // p a } → β)
/-- For a fixed function `x₀ : {a // p a} → β` defined on a subtype of `α`,
the subtype of functions `x : α → β` that agree with `x₀` on the subtype `{a // p a}`
is naturally equivalent to the type of functions `{a // ¬ p a} → β`. -/
@[simps]
def subtypePreimage : { x : α → β // x ∘ Subtype.val = x₀ } ≃ ({ a // ¬p a } → β) where
toFun (x : { x : α → β // x ∘ Subtype.val = x₀ }) a := (x : α → β) a
invFun x := ⟨fun a => if h : p a then x₀ ⟨a, h⟩ else x ⟨a, h⟩, funext fun ⟨_, h⟩ => dif_pos h⟩
left_inv := fun ⟨x, hx⟩ =>
Subtype.val_injective <|
funext fun a => by
dsimp only
split_ifs
· rw [← hx]; rfl
· rfl
right_inv x :=
funext fun ⟨a, h⟩ =>
show dite (p a) _ _ = _ by
dsimp only
rw [dif_neg h]
theorem subtypePreimage_symm_apply_coe_pos (x : { a // ¬p a } → β) (a : α) (h : p a) :
((subtypePreimage p x₀).symm x : α → β) a = x₀ ⟨a, h⟩ :=
dif_pos h
theorem subtypePreimage_symm_apply_coe_neg (x : { a // ¬p a } → β) (a : α) (h : ¬p a) :
((subtypePreimage p x₀).symm x : α → β) a = x ⟨a, h⟩ :=
dif_neg h
end subtypePreimage
section
/-- A family of equivalences `∀ a, β₁ a ≃ β₂ a` generates an equivalence between `∀ a, β₁ a` and
`∀ a, β₂ a`. -/
@[simps]
def piCongrRight {β₁ β₂ : α → Sort*} (F : ∀ a, β₁ a ≃ β₂ a) : (∀ a, β₁ a) ≃ (∀ a, β₂ a) :=
⟨Pi.map fun a ↦ F a, Pi.map fun a ↦ (F a).symm, fun H => funext <| by simp,
fun H => funext <| by simp⟩
/-- Given `φ : α → β → Sort*`, we have an equivalence between `∀ a b, φ a b` and `∀ b a, φ a b`.
This is `Function.swap` as an `Equiv`. -/
@[simps apply]
def piComm (φ : α → β → Sort*) : (∀ a b, φ a b) ≃ ∀ b a, φ a b :=
⟨swap, swap, fun _ => rfl, fun _ => rfl⟩
@[simp]
theorem piComm_symm {φ : α → β → Sort*} : (piComm φ).symm = (piComm <| swap φ) :=
rfl
/-- Dependent `curry` equivalence: the type of dependent functions on `Σ i, β i` is equivalent
to the type of dependent functions of two arguments (i.e., functions to the space of functions).
This is `Sigma.curry` and `Sigma.uncurry` together as an equiv. -/
def piCurry {α} {β : α → Type*} (γ : ∀ a, β a → Type*) :
(∀ x : Σ i, β i, γ x.1 x.2) ≃ ∀ a b, γ a b where
toFun := Sigma.curry
invFun := Sigma.uncurry
left_inv := Sigma.uncurry_curry
right_inv := Sigma.curry_uncurry
-- `simps` overapplies these but `simps -fullyApplied` under-applies them
@[simp] theorem piCurry_apply {α} {β : α → Type*} (γ : ∀ a, β a → Type*)
(f : ∀ x : Σ i, β i, γ x.1 x.2) :
piCurry γ f = Sigma.curry f :=
rfl
@[simp] theorem piCurry_symm_apply {α} {β : α → Type*} (γ : ∀ a, β a → Type*) (f : ∀ a b, γ a b) :
(piCurry γ).symm f = Sigma.uncurry f :=
rfl
end
section prodCongr
variable {α₁ α₂ β₁ β₂ : Type*} (e : α₁ → β₁ ≃ β₂)
-- See also `Equiv.ofPreimageEquiv`.
/-- A family of equivalences between fibers gives an equivalence between domains. -/
@[simps!]
def ofFiberEquiv {α β γ} {f : α → γ} {g : β → γ}
(e : ∀ c, { a // f a = c } ≃ { b // g b = c }) : α ≃ β :=
(sigmaFiberEquiv f).symm.trans <| (Equiv.sigmaCongrRight e).trans (sigmaFiberEquiv g)
theorem ofFiberEquiv_map {α β γ} {f : α → γ} {g : β → γ}
(e : ∀ c, { a // f a = c } ≃ { b // g b = c }) (a : α) : g (ofFiberEquiv e a) = f a :=
(_ : { b // g b = _ }).property
end prodCongr
section
open Sum
/-- An equivalence that separates out the 0th fiber of `(Σ (n : ℕ), f n)`. -/
def sigmaNatSucc (f : ℕ → Type u) : (Σ n, f n) ≃ f 0 ⊕ Σ n, f (n + 1) :=
⟨fun x =>
@Sigma.casesOn ℕ f (fun _ => f 0 ⊕ Σ n, f (n + 1)) x fun n =>
@Nat.casesOn (fun i => f i → f 0 ⊕ Σ n : ℕ, f (n + 1)) n (fun x : f 0 => Sum.inl x)
fun (n : ℕ) (x : f n.succ) => Sum.inr ⟨n, x⟩,
Sum.elim (Sigma.mk 0) (Sigma.map Nat.succ fun _ => id), by rintro ⟨n | n, x⟩ <;> rfl, by
rintro (x | ⟨n, x⟩) <;> rfl⟩
end
section
open Sum Nat
/-- The set of natural numbers is equivalent to `ℕ ⊕ PUnit`. -/
def natEquivNatSumPUnit : ℕ ≃ ℕ ⊕ PUnit where
toFun n := Nat.casesOn n (inr PUnit.unit) inl
invFun := Sum.elim Nat.succ fun _ => 0
left_inv n := by cases n <;> rfl
right_inv := by rintro (_ | _) <;> rfl
/-- `ℕ ⊕ PUnit` is equivalent to `ℕ`. -/
def natSumPUnitEquivNat : ℕ ⊕ PUnit ≃ ℕ :=
natEquivNatSumPUnit.symm
/-- The type of integer numbers is equivalent to `ℕ ⊕ ℕ`. -/
def intEquivNatSumNat : ℤ ≃ ℕ ⊕ ℕ where
toFun z := Int.casesOn z inl inr
invFun := Sum.elim Int.ofNat Int.negSucc
left_inv := by rintro (m | n) <;> rfl
right_inv := by rintro (m | n) <;> rfl
end
/-- If `α` is equivalent to `β`, then `Unique α` is equivalent to `Unique β`. -/
def uniqueCongr (e : α ≃ β) : Unique α ≃ Unique β where
toFun h := @Equiv.unique _ _ h e.symm
invFun h := @Equiv.unique _ _ h e
left_inv _ := Subsingleton.elim _ _
right_inv _ := Subsingleton.elim _ _
/-- If `α` is equivalent to `β`, then `IsEmpty α` is equivalent to `IsEmpty β`. -/
theorem isEmpty_congr (e : α ≃ β) : IsEmpty α ↔ IsEmpty β :=
⟨fun h => @Function.isEmpty _ _ h e.symm, fun h => @Function.isEmpty _ _ h e⟩
protected theorem isEmpty (e : α ≃ β) [IsEmpty β] : IsEmpty α :=
e.isEmpty_congr.mpr ‹_›
section
open Subtype
/-- If `α` is equivalent to `β` and the predicates `p : α → Prop` and `q : β → Prop` are equivalent
at corresponding points, then `{a // p a}` is equivalent to `{b // q b}`.
For the statement where `α = β`, that is, `e : perm α`, see `Perm.subtypePerm`. -/
@[simps apply]
def subtypeEquiv {p : α → Prop} {q : β → Prop} (e : α ≃ β) (h : ∀ a, p a ↔ q (e a)) :
{ a : α // p a } ≃ { b : β // q b } where
toFun a := ⟨e a, (h _).mp a.property⟩
invFun b := ⟨e.symm b, (h _).mpr ((e.apply_symm_apply b).symm ▸ b.property)⟩
left_inv a := Subtype.ext <| by simp
right_inv b := Subtype.ext <| by simp
lemma coe_subtypeEquiv_eq_map {X Y} {p : X → Prop} {q : Y → Prop} (e : X ≃ Y)
(h : ∀ x, p x ↔ q (e x)) : ⇑(e.subtypeEquiv h) = Subtype.map e (h · |>.mp) :=
rfl
@[simp]
theorem subtypeEquiv_refl {p : α → Prop} (h : ∀ a, p a ↔ p (Equiv.refl _ a) := fun _ => Iff.rfl) :
(Equiv.refl α).subtypeEquiv h = Equiv.refl { a : α // p a } := by
ext
rfl
-- We use `as_aux_lemma` here to avoid creating large proof terms when using `simp`
@[simp]
theorem subtypeEquiv_symm {p : α → Prop} {q : β → Prop} (e : α ≃ β) (h : ∀ a : α, p a ↔ q (e a)) :
(e.subtypeEquiv h).symm =
e.symm.subtypeEquiv (by as_aux_lemma =>
intro a
convert (h <| e.symm a).symm
exact (e.apply_symm_apply a).symm) :=
rfl
@[simp]
theorem subtypeEquiv_trans {p : α → Prop} {q : β → Prop} {r : γ → Prop} (e : α ≃ β) (f : β ≃ γ)
(h : ∀ a : α, p a ↔ q (e a)) (h' : ∀ b : β, q b ↔ r (f b)) :
(e.subtypeEquiv h).trans (f.subtypeEquiv h')
= (e.trans f).subtypeEquiv (by as_aux_lemma => exact fun a => (h a).trans (h' <| e a)) :=
rfl
/-- If two predicates `p` and `q` are pointwise equivalent, then `{x // p x}` is equivalent to
`{x // q x}`. -/
@[simps!]
def subtypeEquivRight {p q : α → Prop} (e : ∀ x, p x ↔ q x) : { x // p x } ≃ { x // q x } :=
subtypeEquiv (Equiv.refl _) e
lemma subtypeEquivRight_apply {p q : α → Prop} (e : ∀ x, p x ↔ q x)
(z : { x // p x }) : subtypeEquivRight e z = ⟨z, (e z.1).mp z.2⟩ := rfl
lemma subtypeEquivRight_symm_apply {p q : α → Prop} (e : ∀ x, p x ↔ q x)
(z : { x // q x }) : (subtypeEquivRight e).symm z = ⟨z, (e z.1).mpr z.2⟩ := rfl
/-- If `α ≃ β`, then for any predicate `p : β → Prop` the subtype `{a // p (e a)}` is equivalent
to the subtype `{b // p b}`. -/
def subtypeEquivOfSubtype {p : β → Prop} (e : α ≃ β) : { a : α // p (e a) } ≃ { b : β // p b } :=
subtypeEquiv e <| by simp
/-- If `α ≃ β`, then for any predicate `p : α → Prop` the subtype `{a // p a}` is equivalent
to the subtype `{b // p (e.symm b)}`. This version is used by `equiv_rw`. -/
def subtypeEquivOfSubtype' {p : α → Prop} (e : α ≃ β) :
{ a : α // p a } ≃ { b : β // p (e.symm b) } :=
e.symm.subtypeEquivOfSubtype.symm
/-- If two predicates are equal, then the corresponding subtypes are equivalent. -/
def subtypeEquivProp {p q : α → Prop} (h : p = q) : Subtype p ≃ Subtype q :=
subtypeEquiv (Equiv.refl α) fun _ => h ▸ Iff.rfl
/-- A subtype of a subtype is equivalent to the subtype of elements satisfying both predicates. This
version allows the “inner” predicate to depend on `h : p a`. -/
@[simps]
def subtypeSubtypeEquivSubtypeExists (p : α → Prop) (q : Subtype p → Prop) :
Subtype q ≃ { a : α // ∃ h : p a, q ⟨a, h⟩ } :=
⟨fun a =>
⟨a.1, a.1.2, by
rcases a with ⟨⟨a, hap⟩, haq⟩
exact haq⟩,
fun a => ⟨⟨a, a.2.fst⟩, a.2.snd⟩, fun ⟨⟨_, _⟩, _⟩ => rfl, fun ⟨_, _, _⟩ => rfl⟩
/-- A subtype of a subtype is equivalent to the subtype of elements satisfying both predicates. -/
@[simps!]
def subtypeSubtypeEquivSubtypeInter {α : Type u} (p q : α → Prop) :
{ x : Subtype p // q x.1 } ≃ Subtype fun x => p x ∧ q x :=
(subtypeSubtypeEquivSubtypeExists p _).trans <|
subtypeEquivRight fun x => @exists_prop (q x) (p x)
/-- If the outer subtype has more restrictive predicate than the inner one,
then we can drop the latter. -/
@[simps!]
def subtypeSubtypeEquivSubtype {α} {p q : α → Prop} (h : ∀ {x}, q x → p x) :
{ x : Subtype p // q x.1 } ≃ Subtype q :=
(subtypeSubtypeEquivSubtypeInter p _).trans <| subtypeEquivRight fun _ => and_iff_right_of_imp h
/-- If a proposition holds for all elements, then the subtype is
equivalent to the original type. -/
@[simps apply symm_apply]
def subtypeUnivEquiv {α} {p : α → Prop} (h : ∀ x, p x) : Subtype p ≃ α :=
⟨fun x => x, fun x => ⟨x, h x⟩, fun _ => Subtype.eq rfl, fun _ => rfl⟩
/-- A subtype of a sigma-type is a sigma-type over a subtype. -/
def subtypeSigmaEquiv {α} (p : α → Type v) (q : α → Prop) : { y : Sigma p // q y.1 } ≃ Σ x :
Subtype q, p x.1 :=
⟨fun x => ⟨⟨x.1.1, x.2⟩, x.1.2⟩, fun x => ⟨⟨x.1.1, x.2⟩, x.1.2⟩, fun _ => rfl,
fun _ => rfl⟩
/-- A sigma type over a subtype is equivalent to the sigma set over the original type,
if the fiber is empty outside of the subset -/
def sigmaSubtypeEquivOfSubset {α} (p : α → Type v) (q : α → Prop) (h : ∀ x, p x → q x) :
(Σ x : Subtype q, p x) ≃ Σ x : α, p x :=
(subtypeSigmaEquiv p q).symm.trans <| subtypeUnivEquiv fun x => h x.1 x.2
/-- If a predicate `p : β → Prop` is true on the range of a map `f : α → β`, then
`Σ y : {y // p y}, {x // f x = y}` is equivalent to `α`. -/
def sigmaSubtypeFiberEquiv {α β : Type*} (f : α → β) (p : β → Prop) (h : ∀ x, p (f x)) :
(Σ y : Subtype p, { x : α // f x = y }) ≃ α :=
calc
_ ≃ Σy : β, { x : α // f x = y } := sigmaSubtypeEquivOfSubset _ p fun _ ⟨x, h'⟩ => h' ▸ h x
_ ≃ α := sigmaFiberEquiv f
/-- If for each `x` we have `p x ↔ q (f x)`, then `Σ y : {y // q y}, f ⁻¹' {y}` is equivalent
to `{x // p x}`. -/
def sigmaSubtypeFiberEquivSubtype {α β : Type*} (f : α → β) {p : α → Prop} {q : β → Prop}
(h : ∀ x, p x ↔ q (f x)) : (Σ y : Subtype q, { x : α // f x = y }) ≃ Subtype p :=
calc
(Σy : Subtype q, { x : α // f x = y }) ≃ Σy :
Subtype q, { x : Subtype p // Subtype.mk (f x) ((h x).1 x.2) = y } := by {
apply sigmaCongrRight
intro y
apply Equiv.symm
refine (subtypeSubtypeEquivSubtypeExists _ _).trans (subtypeEquivRight ?_)
intro x
exact ⟨fun ⟨hp, h'⟩ => congr_arg Subtype.val h', fun h' => ⟨(h x).2 (h'.symm ▸ y.2),
Subtype.eq h'⟩⟩ }
_ ≃ Subtype p := sigmaFiberEquiv fun x : Subtype p => (⟨f x, (h x).1 x.property⟩ : Subtype q)
/-- A sigma type over an `Option` is equivalent to the sigma set over the original type,
if the fiber is empty at none. -/
def sigmaOptionEquivOfSome {α} (p : Option α → Type v) (h : p none → False) :
(Σ x : Option α, p x) ≃ Σ x : α, p (some x) :=
haveI h' : ∀ x, p x → x.isSome := by
intro x
cases x
· intro n
exfalso
exact h n
· intro _
exact rfl
(sigmaSubtypeEquivOfSubset _ _ h').symm.trans (sigmaCongrLeft' (optionIsSomeEquiv α))
/-- The `Pi`-type `∀ i, π i` is equivalent to the type of sections `f : ι → Σ i, π i` of the
`Sigma` type such that for all `i` we have `(f i).fst = i`. -/
def piEquivSubtypeSigma (ι) (π : ι → Type*) :
(∀ i, π i) ≃ { f : ι → Σ i, π i // ∀ i, (f i).1 = i } where
toFun := fun f => ⟨fun i => ⟨i, f i⟩, fun _ => rfl⟩
invFun := fun f i => by rw [← f.2 i]; exact (f.1 i).2
left_inv := fun _ => funext fun _ => rfl
right_inv := fun ⟨f, hf⟩ =>
Subtype.eq <| funext fun i =>
Sigma.eq (hf i).symm <| eq_of_heq <| rec_heq_of_heq _ <| by simp
/-- The type of functions `f : ∀ a, β a` such that for all `a` we have `p a (f a)` is equivalent
to the type of functions `∀ a, {b : β a // p a b}`. -/
def subtypePiEquivPi {β : α → Sort v} {p : ∀ a, β a → Prop} :
{ f : ∀ a, β a // ∀ a, p a (f a) } ≃ ∀ a, { b : β a // p a b } where
toFun := fun f a => ⟨f.1 a, f.2 a⟩
invFun := fun f => ⟨fun a => (f a).1, fun a => (f a).2⟩
left_inv := by
rintro ⟨f, h⟩
rfl
right_inv := by
rintro f
funext a
exact Subtype.ext_val rfl
end
section subtypeEquivCodomain
variable {X Y : Sort*} [DecidableEq X] {x : X}
/-- The type of all functions `X → Y` with prescribed values for all `x' ≠ x`
is equivalent to the codomain `Y`. -/
def subtypeEquivCodomain (f : { x' // x' ≠ x } → Y) :
{ g : X → Y // g ∘ (↑) = f } ≃ Y :=
(subtypePreimage _ f).trans <|
@funUnique { x' // ¬x' ≠ x } _ <|
show Unique { x' // ¬x' ≠ x } from
@Equiv.unique _ _
(show Unique { x' // x' = x } from {
default := ⟨x, rfl⟩, uniq := fun ⟨_, h⟩ => Subtype.val_injective h })
(subtypeEquivRight fun _ => not_not)
@[simp]
theorem coe_subtypeEquivCodomain (f : { x' // x' ≠ x } → Y) :
(subtypeEquivCodomain f : _ → Y) =
fun g : { g : X → Y // g ∘ (↑) = f } => (g : X → Y) x :=
rfl
@[simp]
theorem subtypeEquivCodomain_apply (f : { x' // x' ≠ x } → Y) (g) :
subtypeEquivCodomain f g = (g : X → Y) x :=
rfl
theorem coe_subtypeEquivCodomain_symm (f : { x' // x' ≠ x } → Y) :
((subtypeEquivCodomain f).symm : Y → _) = fun y =>
⟨fun x' => if h : x' ≠ x then f ⟨x', h⟩ else y, by
funext x'
simp only [ne_eq, dite_not, comp_apply, Subtype.coe_eta, dite_eq_ite, ite_eq_right_iff]
intro w
exfalso
exact x'.property w⟩ :=
rfl
@[simp]
theorem subtypeEquivCodomain_symm_apply (f : { x' // x' ≠ x } → Y) (y : Y) (x' : X) :
((subtypeEquivCodomain f).symm y : X → Y) x' = if h : x' ≠ x then f ⟨x', h⟩ else y :=
rfl
theorem subtypeEquivCodomain_symm_apply_eq (f : { x' // x' ≠ x } → Y) (y : Y) :
((subtypeEquivCodomain f).symm y : X → Y) x = y :=
dif_neg (not_not.mpr rfl)
theorem subtypeEquivCodomain_symm_apply_ne
(f : { x' // x' ≠ x } → Y) (y : Y) (x' : X) (h : x' ≠ x) :
((subtypeEquivCodomain f).symm y : X → Y) x' = f ⟨x', h⟩ :=
dif_pos h
end subtypeEquivCodomain
instance : CanLift (α → β) (α ≃ β) (↑) Bijective where prf f hf := ⟨ofBijective f hf, rfl⟩
section
variable {α' β' : Type*} (e : Perm α') {p : β' → Prop} [DecidablePred p] (f : α' ≃ Subtype p)
/-- Extend the domain of `e : Equiv.Perm α` to one that is over `β` via `f : α → Subtype p`,
where `p : β → Prop`, permuting only the `b : β` that satisfy `p b`.
This can be used to extend the domain across a function `f : α → β`,
keeping everything outside of `Set.range f` fixed. For this use-case `Equiv` given by `f` can
be constructed by `Equiv.of_leftInverse'` or `Equiv.of_leftInverse` when there is a known
inverse, or `Equiv.ofInjective` in the general case.
-/
def Perm.extendDomain : Perm β' :=
(permCongr f e).subtypeCongr (Equiv.refl _)
@[simp]
theorem Perm.extendDomain_apply_image (a : α') : e.extendDomain f (f a) = f (e a) := by
simp [Perm.extendDomain]
theorem Perm.extendDomain_apply_subtype {b : β'} (h : p b) :
e.extendDomain f b = f (e (f.symm ⟨b, h⟩)) := by
simp [Perm.extendDomain, h]
theorem Perm.extendDomain_apply_not_subtype {b : β'} (h : ¬p b) : e.extendDomain f b = b := by
simp [Perm.extendDomain, h]
@[simp]
theorem Perm.extendDomain_refl : Perm.extendDomain (Equiv.refl _) f = Equiv.refl _ := by
simp [Perm.extendDomain]
@[simp]
theorem Perm.extendDomain_symm : (e.extendDomain f).symm = Perm.extendDomain e.symm f :=
rfl
theorem Perm.extendDomain_trans (e e' : Perm α') :
(e.extendDomain f).trans (e'.extendDomain f) = Perm.extendDomain (e.trans e') f := by
simp [Perm.extendDomain, permCongr_trans]
end
/-- Subtype of the quotient is equivalent to the quotient of the subtype. Let `α` be a setoid with
equivalence relation `~`. Let `p₂` be a predicate on the quotient type `α/~`, and `p₁` be the lift
of this predicate to `α`: `p₁ a ↔ p₂ ⟦a⟧`. Let `~₂` be the restriction of `~` to `{x // p₁ x}`.
Then `{x // p₂ x}` is equivalent to the quotient of `{x // p₁ x}` by `~₂`. -/
def subtypeQuotientEquivQuotientSubtype (p₁ : α → Prop) {s₁ : Setoid α} {s₂ : Setoid (Subtype p₁)}
(p₂ : Quotient s₁ → Prop) (hp₂ : ∀ a, p₁ a ↔ p₂ ⟦a⟧)
(h : ∀ x y : Subtype p₁, s₂.r x y ↔ s₁.r x y) : {x // p₂ x} ≃ Quotient s₂ where
toFun a :=
Quotient.hrecOn a.1 (fun a h => ⟦⟨a, (hp₂ _).2 h⟩⟧)
(fun a b hab => hfunext (by rw [Quotient.sound hab]) fun _ _ _ =>
heq_of_eq (Quotient.sound ((h _ _).2 hab)))
a.2
invFun a :=
Quotient.liftOn a (fun a => (⟨⟦a.1⟧, (hp₂ _).1 a.2⟩ : { x // p₂ x })) fun _ _ hab =>
Subtype.ext_val (Quotient.sound ((h _ _).1 hab))
left_inv := by exact fun ⟨a, ha⟩ => Quotient.inductionOn a (fun b hb => rfl) ha
right_inv a := by exact Quotient.inductionOn a fun ⟨a, ha⟩ => rfl
@[simp]
theorem subtypeQuotientEquivQuotientSubtype_mk (p₁ : α → Prop)
[s₁ : Setoid α] [s₂ : Setoid (Subtype p₁)] (p₂ : Quotient s₁ → Prop) (hp₂ : ∀ a, p₁ a ↔ p₂ ⟦a⟧)
(h : ∀ x y : Subtype p₁, s₂ x y ↔ (x : α) ≈ y)
(x hx) : subtypeQuotientEquivQuotientSubtype p₁ p₂ hp₂ h ⟨⟦x⟧, hx⟩ = ⟦⟨x, (hp₂ _).2 hx⟩⟧ :=
rfl
@[simp]
theorem subtypeQuotientEquivQuotientSubtype_symm_mk (p₁ : α → Prop)
[s₁ : Setoid α] [s₂ : Setoid (Subtype p₁)] (p₂ : Quotient s₁ → Prop) (hp₂ : ∀ a, p₁ a ↔ p₂ ⟦a⟧)
(h : ∀ x y : Subtype p₁, s₂ x y ↔ (x : α) ≈ y) (x) :
(subtypeQuotientEquivQuotientSubtype p₁ p₂ hp₂ h).symm ⟦x⟧ = ⟨⟦x⟧, (hp₂ _).1 x.property⟩ :=
rfl
section Swap
variable [DecidableEq α]
/-- A helper function for `Equiv.swap`. -/
def swapCore (a b r : α) : α :=
if r = a then b else if r = b then a else r
theorem swapCore_self (r a : α) : swapCore a a r = r := by
unfold swapCore
split_ifs <;> simp [*]
theorem swapCore_swapCore (r a b : α) : swapCore a b (swapCore a b r) = r := by
unfold swapCore; split_ifs <;> cc
theorem swapCore_comm (r a b : α) : swapCore a b r = swapCore b a r := by
unfold swapCore; split_ifs <;> cc
/-- `swap a b` is the permutation that swaps `a` and `b` and
leaves other values as is. -/
def swap (a b : α) : Perm α :=
⟨swapCore a b, swapCore a b, fun r => swapCore_swapCore r a b,
fun r => swapCore_swapCore r a b⟩
@[simp]
theorem swap_self (a : α) : swap a a = Equiv.refl _ :=
ext fun r => swapCore_self r a
theorem swap_comm (a b : α) : swap a b = swap b a :=
ext fun r => swapCore_comm r _ _
theorem swap_apply_def (a b x : α) : swap a b x = if x = a then b else if x = b then a else x :=
rfl
@[simp]
theorem swap_apply_left (a b : α) : swap a b a = b :=
if_pos rfl
@[simp]
theorem swap_apply_right (a b : α) : swap a b b = a := by
by_cases h : b = a <;> simp [swap_apply_def, h]
theorem swap_apply_of_ne_of_ne {a b x : α} : x ≠ a → x ≠ b → swap a b x = x := by
simp +contextual [swap_apply_def]
theorem eq_or_eq_of_swap_apply_ne_self {a b x : α} (h : swap a b x ≠ x) : x = a ∨ x = b := by
contrapose! h
exact swap_apply_of_ne_of_ne h.1 h.2
@[simp]
theorem swap_swap (a b : α) : (swap a b).trans (swap a b) = Equiv.refl _ :=
ext fun _ => swapCore_swapCore _ _ _
@[simp]
theorem symm_swap (a b : α) : (swap a b).symm = swap a b :=
rfl
@[simp]
theorem swap_eq_refl_iff {x y : α} : swap x y = Equiv.refl _ ↔ x = y := by
refine ⟨fun h => (Equiv.refl _).injective ?_, fun h => h ▸ swap_self _⟩
rw [← h, swap_apply_left, h, refl_apply]
theorem swap_comp_apply {a b x : α} (π : Perm α) :
π.trans (swap a b) x = if π x = a then b else if π x = b then a else π x := by
cases π
rfl
theorem swap_eq_update (i j : α) : (Equiv.swap i j : α → α) = update (update id j i) i j :=
funext fun x => by rw [update_apply _ i j, update_apply _ j i, Equiv.swap_apply_def, id]
theorem comp_swap_eq_update (i j : α) (f : α → β) :
f ∘ Equiv.swap i j = update (update f j (f i)) i (f j) := by
rw [swap_eq_update, comp_update, comp_update, comp_id]
@[simp]
theorem symm_trans_swap_trans [DecidableEq β] (a b : α) (e : α ≃ β) :
(e.symm.trans (swap a b)).trans e = swap (e a) (e b) :=
Equiv.ext fun x => by
have : ∀ a, e.symm x = a ↔ x = e a := fun a => by
rw [@eq_comm _ (e.symm x)]
constructor <;> intros <;> simp_all
simp only [trans_apply, swap_apply_def, this]
split_ifs <;> simp
@[simp]
theorem trans_swap_trans_symm [DecidableEq β] (a b : β) (e : α ≃ β) :
(e.trans (swap a b)).trans e.symm = swap (e.symm a) (e.symm b) :=
symm_trans_swap_trans a b e.symm
@[simp]
theorem swap_apply_self (i j a : α) : swap i j (swap i j a) = a := by
rw [← Equiv.trans_apply, Equiv.swap_swap, Equiv.refl_apply]
/-- A function is invariant to a swap if it is equal at both elements -/
theorem apply_swap_eq_self {v : α → β} {i j : α} (hv : v i = v j) (k : α) :
v (swap i j k) = v k := by
by_cases hi : k = i
· rw [hi, swap_apply_left, hv]
by_cases hj : k = j
· rw [hj, swap_apply_right, hv]
rw [swap_apply_of_ne_of_ne hi hj]
theorem swap_apply_eq_iff {x y z w : α} : swap x y z = w ↔ z = swap x y w := by
rw [apply_eq_iff_eq_symm_apply, symm_swap]
theorem swap_apply_ne_self_iff {a b x : α} : swap a b x ≠ x ↔ a ≠ b ∧ (x = a ∨ x = b) := by
by_cases hab : a = b
· simp [hab]
by_cases hax : x = a
· simp [hax, eq_comm]
by_cases hbx : x = b
· simp [hbx]
simp [hab, hax, hbx, swap_apply_of_ne_of_ne]
namespace Perm
@[simp]
theorem sumCongr_swap_refl {α β : Sort _} [DecidableEq α] [DecidableEq β] (i j : α) :
Equiv.Perm.sumCongr (Equiv.swap i j) (Equiv.refl β) = Equiv.swap (Sum.inl i) (Sum.inl j) := by
ext x
cases x
· simp only [Equiv.sumCongr_apply, Sum.map, coe_refl, comp_id, Sum.elim_inl, comp_apply,
swap_apply_def, Sum.inl.injEq]
split_ifs <;> rfl
· simp [Sum.map, swap_apply_of_ne_of_ne]
@[simp]
theorem sumCongr_refl_swap {α β : Sort _} [DecidableEq α] [DecidableEq β] (i j : β) :
Equiv.Perm.sumCongr (Equiv.refl α) (Equiv.swap i j) = Equiv.swap (Sum.inr i) (Sum.inr j) := by
ext x
cases x
· simp [Sum.map, swap_apply_of_ne_of_ne]
· simp only [Equiv.sumCongr_apply, Sum.map, coe_refl, comp_id, Sum.elim_inr, comp_apply,
swap_apply_def, Sum.inr.injEq]
split_ifs <;> rfl
end Perm
/-- Augment an equivalence with a prescribed mapping `f a = b` -/
def setValue (f : α ≃ β) (a : α) (b : β) : α ≃ β :=
(swap a (f.symm b)).trans f
@[simp]
theorem setValue_eq (f : α ≃ β) (a : α) (b : β) : setValue f a b a = b := by
simp [setValue, swap_apply_left]
end Swap
end Equiv
namespace Function.Involutive
/-- Convert an involutive function `f` to a permutation with `toFun = invFun = f`. -/
def toPerm (f : α → α) (h : Involutive f) : Equiv.Perm α :=
⟨f, f, h.leftInverse, h.rightInverse⟩
@[simp]
theorem coe_toPerm {f : α → α} (h : Involutive f) : (h.toPerm f : α → α) = f :=
rfl
@[simp]
theorem toPerm_symm {f : α → α} (h : Involutive f) : (h.toPerm f).symm = h.toPerm f :=
rfl
theorem toPerm_involutive {f : α → α} (h : Involutive f) : Involutive (h.toPerm f) :=
h
theorem symm_eq_self_of_involutive (f : Equiv.Perm α) (h : Involutive f) : f.symm = f :=
DFunLike.coe_injective (h.leftInverse_iff.mp f.left_inv)
end Function.Involutive
theorem PLift.eq_up_iff_down_eq {x : PLift α} {y : α} : x = PLift.up y ↔ x.down = y :=
Equiv.plift.eq_symm_apply
theorem Function.Injective.map_swap [DecidableEq α] [DecidableEq β] {f : α → β}
(hf : Function.Injective f) (x y z : α) :
f (Equiv.swap x y z) = Equiv.swap (f x) (f y) (f z) := by
conv_rhs => rw [Equiv.swap_apply_def]
split_ifs with h₁ h₂
· rw [hf h₁, Equiv.swap_apply_left]
· rw [hf h₂, Equiv.swap_apply_right]
· rw [Equiv.swap_apply_of_ne_of_ne (mt (congr_arg f) h₁) (mt (congr_arg f) h₂)]
namespace Equiv
section
/-- Transport dependent functions through an equivalence of the base space.
-/
@[simps apply, simps -isSimp symm_apply]
def piCongrLeft' (P : α → Sort*) (e : α ≃ β) : (∀ a, P a) ≃ ∀ b, P (e.symm b) where
toFun f x := f (e.symm x)
invFun f x := (e.symm_apply_apply x).ndrec (f (e x))
left_inv f := funext fun x =>
(by rintro _ rfl; rfl : ∀ {y} (h : y = x), h.ndrec (f y) = f x) (e.symm_apply_apply x)
right_inv f := funext fun x =>
(by rintro _ rfl; rfl : ∀ {y} (h : y = x), (congr_arg e.symm h).ndrec (f y) = f x)
(e.apply_symm_apply x)
/-- Note: the "obvious" statement `(piCongrLeft' P e).symm g a = g (e a)` doesn't typecheck: the
LHS would have type `P a` while the RHS would have type `P (e.symm (e a))`. For that reason,
we have to explicitly substitute along `e.symm (e a) = a` in the statement of this lemma. -/
add_decl_doc Equiv.piCongrLeft'_symm_apply
/-- This lemma is impractical to state in the dependent case. -/
@[simp]
theorem piCongrLeft'_symm (P : Sort*) (e : α ≃ β) :
(piCongrLeft' (fun _ => P) e).symm = piCongrLeft' _ e.symm := by ext; simp [piCongrLeft']
/-- Note: the "obvious" statement `(piCongrLeft' P e).symm g a = g (e a)` doesn't typecheck: the
LHS would have type `P a` while the RHS would have type `P (e.symm (e a))`. This lemma is a way
around it in the case where `a` is of the form `e.symm b`, so we can use `g b` instead of
`g (e (e.symm b))`. -/
@[simp]
lemma piCongrLeft'_symm_apply_apply (P : α → Sort*) (e : α ≃ β) (g : ∀ b, P (e.symm b)) (b : β) :
(piCongrLeft' P e).symm g (e.symm b) = g b := by
rw [piCongrLeft'_symm_apply, ← heq_iff_eq, rec_heq_iff_heq]
exact congr_arg_heq _ (e.apply_symm_apply _)
end
section
variable (P : β → Sort w) (e : α ≃ β)
/-- Transporting dependent functions through an equivalence of the base,
expressed as a "simplification".
-/
def piCongrLeft : (∀ a, P (e a)) ≃ ∀ b, P b :=
(piCongrLeft' P e.symm).symm
/-- Note: the "obvious" statement `(piCongrLeft P e) f b = f (e.symm b)` doesn't typecheck: the
LHS would have type `P b` while the RHS would have type `P (e (e.symm b))`. For that reason,
we have to explicitly substitute along `e (e.symm b) = b` in the statement of this lemma. -/
@[simp]
lemma piCongrLeft_apply (f : ∀ a, P (e a)) (b : β) :
(piCongrLeft P e) f b = e.apply_symm_apply b ▸ f (e.symm b) :=
rfl
@[simp]
lemma piCongrLeft_symm_apply (g : ∀ b, P b) (a : α) :
(piCongrLeft P e).symm g a = g (e a) :=
piCongrLeft'_apply P e.symm g a
/-- Note: the "obvious" statement `(piCongrLeft P e) f b = f (e.symm b)` doesn't typecheck: the
LHS would have type `P b` while the RHS would have type `P (e (e.symm b))`. This lemma is a way
around it in the case where `b` is of the form `e a`, so we can use `f a` instead of
`f (e.symm (e a))`. -/
lemma piCongrLeft_apply_apply (f : ∀ a, P (e a)) (a : α) :
(piCongrLeft P e) f (e a) = f a :=
piCongrLeft'_symm_apply_apply P e.symm f a
open Sum
lemma piCongrLeft_apply_eq_cast {P : β → Sort v} {e : α ≃ β}
(f : (a : α) → P (e a)) (b : β) :
piCongrLeft P e f b = cast (congr_arg P (e.apply_symm_apply b)) (f (e.symm b)) :=
Eq.rec_eq_cast _ _
theorem piCongrLeft_sumInl {ι ι' ι''} (π : ι'' → Type*) (e : ι ⊕ ι' ≃ ι'') (f : ∀ i, π (e (inl i)))
(g : ∀ i, π (e (inr i))) (i : ι) :
piCongrLeft π e (sumPiEquivProdPi (fun x => π (e x)) |>.symm (f, g)) (e (inl i)) = f i := by
simp_rw [piCongrLeft_apply_eq_cast, sumPiEquivProdPi_symm_apply,
sum_rec_congr _ _ _ (e.symm_apply_apply (inl i)), cast_cast, cast_eq]
theorem piCongrLeft_sumInr {ι ι' ι''} (π : ι'' → Type*) (e : ι ⊕ ι' ≃ ι'') (f : ∀ i, π (e (inl i)))
(g : ∀ i, π (e (inr i))) (j : ι') :
piCongrLeft π e (sumPiEquivProdPi (fun x => π (e x)) |>.symm (f, g)) (e (inr j)) = g j := by
simp_rw [piCongrLeft_apply_eq_cast, sumPiEquivProdPi_symm_apply,
sum_rec_congr _ _ _ (e.symm_apply_apply (inr j)), cast_cast, cast_eq]
@[deprecated (since := "2025-02-21")] alias piCongrLeft_sum_inl := piCongrLeft_sumInl
@[deprecated (since := "2025-02-21")] alias piCongrLeft_sum_inr := piCongrLeft_sumInr
end
section
variable {W : α → Sort w} {Z : β → Sort z} (h₁ : α ≃ β) (h₂ : ∀ a : α, W a ≃ Z (h₁ a))
/-- Transport dependent functions through
an equivalence of the base spaces and a family
of equivalences of the matching fibers.
-/
def piCongr : (∀ a, W a) ≃ ∀ b, Z b :=
(Equiv.piCongrRight h₂).trans (Equiv.piCongrLeft _ h₁)
@[simp]
theorem coe_piCongr_symm : ((h₁.piCongr h₂).symm :
(∀ b, Z b) → ∀ a, W a) = fun f a => (h₂ a).symm (f (h₁ a)) :=
rfl
theorem piCongr_symm_apply (f : ∀ b, Z b) :
(h₁.piCongr h₂).symm f = fun a => (h₂ a).symm (f (h₁ a)) :=
rfl
@[simp]
theorem piCongr_apply_apply (f : ∀ a, W a) (a : α) : h₁.piCongr h₂ f (h₁ a) = h₂ a (f a) := by
simp only [piCongr, piCongrRight, trans_apply, coe_fn_mk, piCongrLeft_apply_apply, Pi.map_apply]
end
section
variable {W : α → Sort w} {Z : β → Sort z} (h₁ : α ≃ β) (h₂ : ∀ b : β, W (h₁.symm b) ≃ Z b)
/-- Transport dependent functions through
an equivalence of the base spaces and a family
of equivalences of the matching fibres.
-/
def piCongr' : (∀ a, W a) ≃ ∀ b, Z b :=
(piCongr h₁.symm fun b => (h₂ b).symm).symm
@[simp]
theorem coe_piCongr' :
(h₁.piCongr' h₂ : (∀ a, W a) → ∀ b, Z b) = fun f b => h₂ b <| f <| h₁.symm b :=
rfl
theorem piCongr'_apply (f : ∀ a, W a) : h₁.piCongr' h₂ f = fun b => h₂ b <| f <| h₁.symm b :=
rfl
@[simp]
theorem piCongr'_symm_apply_symm_apply (f : ∀ b, Z b) (b : β) :
(h₁.piCongr' h₂).symm f (h₁.symm b) = (h₂ b).symm (f b) := by
simp [piCongr', piCongr_apply_apply]
end
/-- Transport dependent functions through an equality of sets. -/
@[simps!] def piCongrSet {α} {W : α → Sort w} {s t : Set α} (h : s = t) :
(∀ i : {i // i ∈ s}, W i) ≃ (∀ i : {i // i ∈ t}, W i) where
toFun f i := f ⟨i, h ▸ i.2⟩
invFun f i := f ⟨i, h.symm ▸ i.2⟩
left_inv f := rfl
right_inv f := rfl
section BinaryOp
variable {α₁ β₁ : Type*} (e : α₁ ≃ β₁) (f : α₁ → α₁ → α₁)
theorem semiconj_conj (f : α₁ → α₁) : Semiconj e f (e.conj f) := fun x => by simp
theorem semiconj₂_conj : Semiconj₂ e f (e.arrowCongr e.conj f) := fun x y => by simp [arrowCongr]
instance [Std.Associative f] : Std.Associative (e.arrowCongr (e.arrowCongr e) f) :=
(e.semiconj₂_conj f).isAssociative_right e.surjective
instance [Std.IdempotentOp f] : Std.IdempotentOp (e.arrowCongr (e.arrowCongr e) f) :=
(e.semiconj₂_conj f).isIdempotent_right e.surjective
end BinaryOp
section ULift
@[simp]
theorem ulift_symm_down {α} (x : α) : (Equiv.ulift.{u, v}.symm x).down = x :=
rfl
end ULift
end Equiv
theorem Function.Injective.swap_apply
[DecidableEq α] [DecidableEq β] {f : α → β} (hf : Function.Injective f) (x y z : α) :
Equiv.swap (f x) (f y) (f z) = f (Equiv.swap x y z) := by
by_cases hx : z = x
· simp [hx]
by_cases hy : z = y
· simp [hy]
rw [Equiv.swap_apply_of_ne_of_ne hx hy, Equiv.swap_apply_of_ne_of_ne (hf.ne hx) (hf.ne hy)]
theorem Function.Injective.swap_comp
[DecidableEq α] [DecidableEq β] {f : α → β} (hf : Function.Injective f) (x y : α) :
Equiv.swap (f x) (f y) ∘ f = f ∘ Equiv.swap x y :=
funext fun _ => hf.swap_apply _ _ _
/-- To give an equivalence between two subsingleton types, it is sufficient to give any two
functions between them. -/
def equivOfSubsingletonOfSubsingleton [Subsingleton α] [Subsingleton β] (f : α → β) (g : β → α) :
α ≃ β where
toFun := f
invFun := g
left_inv _ := Subsingleton.elim _ _
right_inv _ := Subsingleton.elim _ _
/-- A nonempty subsingleton type is (noncomputably) equivalent to `PUnit`. -/
noncomputable def Equiv.punitOfNonemptyOfSubsingleton [h : Nonempty α] [Subsingleton α] :
α ≃ PUnit :=
equivOfSubsingletonOfSubsingleton (fun _ => PUnit.unit) fun _ => h.some
/-- `Unique (Unique α)` is equivalent to `Unique α`. -/
def uniqueUniqueEquiv : Unique (Unique α) ≃ Unique α :=
equivOfSubsingletonOfSubsingleton (fun h => h.default) fun h =>
{ default := h, uniq := fun _ => Subsingleton.elim _ _ }
/-- If `Unique β`, then `Unique α` is equivalent to `α ≃ β`. -/
def uniqueEquivEquivUnique (α : Sort u) (β : Sort v) [Unique β] : Unique α ≃ (α ≃ β) :=
equivOfSubsingletonOfSubsingleton (fun _ => Equiv.ofUnique _ _) Equiv.unique
namespace Function
variable {α' : Sort*}
theorem update_comp_equiv [DecidableEq α'] [DecidableEq α] (f : α → β)
(g : α' ≃ α) (a : α) (v : β) :
update f a v ∘ g = update (f ∘ g) (g.symm a) v := by
rw [← update_comp_eq_of_injective _ g.injective, g.apply_symm_apply]
theorem update_apply_equiv_apply [DecidableEq α'] [DecidableEq α] (f : α → β)
(g : α' ≃ α) (a : α) (v : β) (a' : α') : update f a v (g a') = update (f ∘ g) (g.symm a) v a' :=
congr_fun (update_comp_equiv f g a v) a'
theorem piCongrLeft'_update [DecidableEq α] [DecidableEq β] (P : α → Sort*) (e : α ≃ β)
(f : ∀ a, P a) (b : β) (x : P (e.symm b)) :
e.piCongrLeft' P (update f (e.symm b) x) = update (e.piCongrLeft' P f) b x := by
ext b'
rcases eq_or_ne b' b with (rfl | h) <;> simp_all
theorem piCongrLeft'_symm_update [DecidableEq α] [DecidableEq β] (P : α → Sort*) (e : α ≃ β)
(f : ∀ b, P (e.symm b)) (b : β) (x : P (e.symm b)) :
(e.piCongrLeft' P).symm (update f b x) = update ((e.piCongrLeft' P).symm f) (e.symm b) x := by
simp [(e.piCongrLeft' P).symm_apply_eq, piCongrLeft'_update]
end Function
| Mathlib/Logic/Equiv/Basic.lean | 2,093 | 2,096 | |
/-
Copyright (c) 2018 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes, Abhimanyu Pallavi Sudhir, Jean Lo, Calle Sönne, Sébastien Gouëzel,
Rémy Degenne, David Loeffler
-/
import Mathlib.Analysis.SpecialFunctions.Pow.NNReal
/-!
# Limits and asymptotics of power functions at `+∞`
This file contains results about the limiting behaviour of power functions at `+∞`. For convenience
some results on asymptotics as `x → 0` (those which are not just continuity statements) are also
located here.
-/
noncomputable section
open Real Topology NNReal ENNReal Filter ComplexConjugate Finset Set
/-!
## Limits at `+∞`
-/
section Limits
open Real Filter
/-- The function `x ^ y` tends to `+∞` at `+∞` for any positive real `y`. -/
theorem tendsto_rpow_atTop {y : ℝ} (hy : 0 < y) : Tendsto (fun x : ℝ => x ^ y) atTop atTop := by
rw [(atTop_basis' 0).tendsto_right_iff]
intro b hb
filter_upwards [eventually_ge_atTop 0, eventually_ge_atTop (b ^ (1 / y))] with x hx₀ hx
simpa (disch := positivity) [Real.rpow_inv_le_iff_of_pos] using hx
/-- The function `x ^ (-y)` tends to `0` at `+∞` for any positive real `y`. -/
theorem tendsto_rpow_neg_atTop {y : ℝ} (hy : 0 < y) : Tendsto (fun x : ℝ => x ^ (-y)) atTop (𝓝 0) :=
Tendsto.congr' (eventuallyEq_of_mem (Ioi_mem_atTop 0) fun _ hx => (rpow_neg (le_of_lt hx) y).symm)
(tendsto_rpow_atTop hy).inv_tendsto_atTop
open Asymptotics in
lemma tendsto_rpow_atTop_of_base_lt_one (b : ℝ) (hb₀ : -1 < b) (hb₁ : b < 1) :
Tendsto (b ^ · : ℝ → ℝ) atTop (𝓝 (0 : ℝ)) := by
rcases lt_trichotomy b 0 with hb|rfl|hb
case inl => -- b < 0
simp_rw [Real.rpow_def_of_nonpos hb.le, hb.ne, ite_false]
rw [← isLittleO_const_iff (c := (1 : ℝ)) one_ne_zero, (one_mul (1 : ℝ)).symm]
refine IsLittleO.mul_isBigO ?exp ?cos
case exp =>
rw [isLittleO_const_iff one_ne_zero]
refine tendsto_exp_atBot.comp <| (tendsto_const_mul_atBot_of_neg ?_).mpr tendsto_id
rw [← log_neg_eq_log, log_neg_iff (by linarith)]
linarith
case cos =>
rw [isBigO_iff]
exact ⟨1, Eventually.of_forall fun x => by simp [Real.abs_cos_le_one]⟩
case inr.inl => -- b = 0
refine Tendsto.mono_right ?_ (Iff.mpr pure_le_nhds_iff rfl)
rw [tendsto_pure]
filter_upwards [eventually_ne_atTop 0] with _ hx
simp [hx]
case inr.inr => -- b > 0
simp_rw [Real.rpow_def_of_pos hb]
refine tendsto_exp_atBot.comp <| (tendsto_const_mul_atBot_of_neg ?_).mpr tendsto_id
exact (log_neg_iff hb).mpr hb₁
lemma tendsto_rpow_atTop_of_base_gt_one (b : ℝ) (hb : 1 < b) :
Tendsto (b ^ · : ℝ → ℝ) atBot (𝓝 (0 : ℝ)) := by
simp_rw [Real.rpow_def_of_pos (by positivity : 0 < b)]
refine tendsto_exp_atBot.comp <| (tendsto_const_mul_atBot_of_pos ?_).mpr tendsto_id
exact (log_pos_iff (by positivity)).mpr <| by aesop
lemma tendsto_rpow_atBot_of_base_lt_one (b : ℝ) (hb₀ : 0 < b) (hb₁ : b < 1) :
Tendsto (b ^ · : ℝ → ℝ) atBot atTop := by
simp_rw [Real.rpow_def_of_pos (by positivity : 0 < b)]
refine tendsto_exp_atTop.comp <| (tendsto_const_mul_atTop_iff_neg <| tendsto_id (α := ℝ)).mpr ?_
exact (log_neg_iff hb₀).mpr hb₁
lemma tendsto_rpow_atBot_of_base_gt_one (b : ℝ) (hb : 1 < b) :
Tendsto (b ^ · : ℝ → ℝ) atBot (𝓝 0) := by
simp_rw [Real.rpow_def_of_pos (by positivity : 0 < b)]
refine tendsto_exp_atBot.comp <| (tendsto_const_mul_atBot_iff_pos <| tendsto_id (α := ℝ)).mpr ?_
exact (log_pos_iff (by positivity)).mpr <| by aesop
/-- The function `x ^ (a / (b * x + c))` tends to `1` at `+∞`, for any real numbers `a`, `b`, and
`c` such that `b` is nonzero. -/
theorem tendsto_rpow_div_mul_add (a b c : ℝ) (hb : 0 ≠ b) :
Tendsto (fun x => x ^ (a / (b * x + c))) atTop (𝓝 1) := by
refine
| Tendsto.congr' ?_
((tendsto_exp_nhds_zero_nhds_one.comp
(by
simpa only [mul_zero, pow_one] using
(tendsto_const_nhds (x := a)).mul
| Mathlib/Analysis/SpecialFunctions/Pow/Asymptotics.lean | 93 | 97 |
/-
Copyright (c) 2023 Andrew Yang, Patrick Lutz. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Andrew Yang
-/
import Mathlib.RingTheory.RootsOfUnity.PrimitiveRoots
import Mathlib.FieldTheory.Galois.Basic
import Mathlib.FieldTheory.KummerPolynomial
import Mathlib.LinearAlgebra.Eigenspace.Minpoly
import Mathlib.RingTheory.Norm.Basic
/-!
# Kummer Extensions
## Main result
- `isCyclic_tfae`:
Suppose `L/K` is a finite extension of dimension `n`, and `K` contains all `n`-th roots of unity.
Then `L/K` is cyclic iff
`L` is a splitting field of some irreducible polynomial of the form `Xⁿ - a : K[X]` iff
`L = K[α]` for some `αⁿ ∈ K`.
- `autEquivRootsOfUnity`:
Given an instance `IsSplittingField K L (X ^ n - C a)`
(perhaps via `isSplittingField_X_pow_sub_C_of_root_adjoin_eq_top`),
then the galois group is isomorphic to `rootsOfUnity n K`, by sending
`σ ↦ σ α / α` for `α ^ n = a`, and the inverse is given by `μ ↦ (α ↦ μ • α)`.
- `autEquivZmod`:
Furthermore, given an explicit choice `ζ` of a primitive `n`-th root of unity, the galois group is
then isomorphic to `Multiplicative (ZMod n)` whose inverse is given by
`i ↦ (α ↦ ζⁱ • α)`.
## Other results
Criteria for `X ^ n - C a` to be irreducible is given:
- `X_pow_sub_C_irreducible_iff_of_prime_pow`:
For `n = p ^ k` an odd prime power, `X ^ n - C a` is irreducible iff `a` is not a `p`-power.
- `X_pow_sub_C_irreducible_iff_forall_prime_of_odd`:
For `n` odd, `X ^ n - C a` is irreducible iff `a` is not a `p`-power for all prime `p ∣ n`.
- `X_pow_sub_C_irreducible_iff_of_odd`:
For `n` odd, `X ^ n - C a` is irreducible iff `a` is not a `d`-power for `d ∣ n` and `d ≠ 1`.
TODO: criteria for even `n`. See [serge_lang_algebra] VI,§9.
TODO: relate Kummer extensions of degree 2 with the class `Algebra.IsQuadraticExtension`.
-/
universe u
variable {K : Type u} [Field K]
open Polynomial IntermediateField AdjoinRoot
section Splits
theorem X_pow_sub_C_splits_of_isPrimitiveRoot
{n : ℕ} {ζ : K} (hζ : IsPrimitiveRoot ζ n) {α a : K} (e : α ^ n = a) :
(X ^ n - C a).Splits (RingHom.id _) := by
cases n.eq_zero_or_pos with
| inl hn =>
rw [hn, pow_zero, ← C.map_one, ← map_sub]
exact splits_C _ _
| inr hn =>
rw [splits_iff_card_roots, ← nthRoots, hζ.card_nthRoots, natDegree_X_pow_sub_C, if_pos ⟨α, e⟩]
-- make this private, as we only use it to prove a strictly more general version
private
theorem X_pow_sub_C_eq_prod'
{n : ℕ} {ζ : K} (hζ : IsPrimitiveRoot ζ n) {α a : K} (hn : 0 < n) (e : α ^ n = a) :
(X ^ n - C a) = ∏ i ∈ Finset.range n, (X - C (ζ ^ i * α)) := by
rw [eq_prod_roots_of_monic_of_splits_id (monic_X_pow_sub_C _ (Nat.pos_iff_ne_zero.mp hn))
(X_pow_sub_C_splits_of_isPrimitiveRoot hζ e), ← nthRoots, hζ.nthRoots_eq e, Multiset.map_map]
rfl
lemma X_pow_sub_C_eq_prod {R : Type*} [CommRing R] [IsDomain R]
{n : ℕ} {ζ : R} (hζ : IsPrimitiveRoot ζ n) {α a : R} (hn : 0 < n) (e : α ^ n = a) :
(X ^ n - C a) = ∏ i ∈ Finset.range n, (X - C (ζ ^ i * α)) := by
let K := FractionRing R
let i := algebraMap R K
have h := FaithfulSMul.algebraMap_injective R K
apply_fun Polynomial.map i using map_injective i h
simpa only [Polynomial.map_sub, Polynomial.map_pow, map_X, map_C, map_mul, map_pow,
Polynomial.map_prod, Polynomial.map_mul]
using X_pow_sub_C_eq_prod' (hζ.map_of_injective h) hn <| map_pow i α n ▸ congrArg i e
end Splits
section Irreducible
theorem X_pow_mul_sub_C_irreducible
{n m : ℕ} {a : K} (hm : Irreducible (X ^ m - C a))
(hn : ∀ (E : Type u) [Field E] [Algebra K E] (x : E) (_ : minpoly K x = X ^ m - C a),
Irreducible (X ^ n - C (AdjoinSimple.gen K x))) :
Irreducible (X ^ (n * m) - C a) := by
have hm' : m ≠ 0 := by
rintro rfl
rw [pow_zero, ← C.map_one, ← map_sub] at hm
exact not_irreducible_C _ hm
simpa [pow_mul] using irreducible_comp (monic_X_pow_sub_C a hm') (monic_X_pow n) hm
(by simpa only [Polynomial.map_pow, map_X] using hn)
-- TODO: generalize to even `n`
theorem X_pow_sub_C_irreducible_of_odd
{n : ℕ} (hn : Odd n) {a : K} (ha : ∀ p : ℕ, p.Prime → p ∣ n → ∀ b : K, b ^ p ≠ a) :
Irreducible (X ^ n - C a) := by
induction n using induction_on_primes generalizing K a with
| h₀ => simp [← Nat.not_even_iff_odd] at hn
| h₁ => simpa using irreducible_X_sub_C a
| h p n hp IH =>
rw [mul_comm]
apply X_pow_mul_sub_C_irreducible
(X_pow_sub_C_irreducible_of_prime hp (ha p hp (dvd_mul_right _ _)))
intro E _ _ x hx
have : IsIntegral K x := not_not.mp fun h ↦ by
simpa only [degree_zero, degree_X_pow_sub_C hp.pos,
WithBot.natCast_ne_bot] using congr_arg degree (hx.symm.trans (dif_neg h))
apply IH (Nat.odd_mul.mp hn).2
intros q hq hqn b hb
apply ha q hq (dvd_mul_of_dvd_right hqn p) (Algebra.norm _ b)
rw [← map_pow, hb, ← adjoin.powerBasis_gen this,
Algebra.PowerBasis.norm_gen_eq_coeff_zero_minpoly]
simp [minpoly_gen, hx, hp.ne_zero.symm, (Nat.odd_mul.mp hn).1.neg_pow]
theorem X_pow_sub_C_irreducible_iff_forall_prime_of_odd {n : ℕ} (hn : Odd n) {a : K} :
Irreducible (X ^ n - C a) ↔ (∀ p : ℕ, p.Prime → p ∣ n → ∀ b : K, b ^ p ≠ a) :=
⟨fun e _ hp hpn ↦ pow_ne_of_irreducible_X_pow_sub_C e hpn hp.ne_one,
X_pow_sub_C_irreducible_of_odd hn⟩
theorem X_pow_sub_C_irreducible_iff_of_odd {n : ℕ} (hn : Odd n) {a : K} :
Irreducible (X ^ n - C a) ↔ (∀ d, d ∣ n → d ≠ 1 → ∀ b : K, b ^ d ≠ a) :=
⟨fun e _ ↦ pow_ne_of_irreducible_X_pow_sub_C e,
fun H ↦ X_pow_sub_C_irreducible_of_odd hn fun p hp hpn ↦ (H p hpn hp.ne_one)⟩
-- TODO: generalize to `p = 2`
theorem X_pow_sub_C_irreducible_of_prime_pow
{p : ℕ} (hp : p.Prime) (hp' : p ≠ 2) (n : ℕ) {a : K} (ha : ∀ b : K, b ^ p ≠ a) :
Irreducible (X ^ (p ^ n) - C a) := by
apply X_pow_sub_C_irreducible_of_odd (hp.odd_of_ne_two hp').pow
intros q hq hq'
simpa [(Nat.prime_dvd_prime_iff_eq hq hp).mp (hq.dvd_of_dvd_pow hq')] using ha
theorem X_pow_sub_C_irreducible_iff_of_prime_pow
{p : ℕ} (hp : p.Prime) (hp' : p ≠ 2) {n} (hn : n ≠ 0) {a : K} :
Irreducible (X ^ p ^ n - C a) ↔ ∀ b, b ^ p ≠ a :=
⟨(pow_ne_of_irreducible_X_pow_sub_C · (dvd_pow dvd_rfl hn) hp.ne_one),
X_pow_sub_C_irreducible_of_prime_pow hp hp' n⟩
end Irreducible
/-!
### Galois Group of `K[n√a]`
We first develop the theory for a specific `K[n√a] := AdjoinRoot (X ^ n - C a)`.
The main result is the description of the galois group: `autAdjoinRootXPowSubCEquiv`.
-/
variable {n : ℕ} (hζ : (primitiveRoots n K).Nonempty)
variable (a : K) (H : Irreducible (X ^ n - C a))
set_option quotPrecheck false in
scoped[KummerExtension] notation3 "K[" n "√" a "]" => AdjoinRoot (Polynomial.X ^ n - Polynomial.C a)
attribute [nolint docBlame] KummerExtension.«termK[_√_]»
open scoped KummerExtension
section AdjoinRoot
include hζ H in
/-- Also see `Polynomial.separable_X_pow_sub_C_unit` -/
theorem Polynomial.separable_X_pow_sub_C_of_irreducible : (X ^ n - C a).Separable := by
letI := Fact.mk H
letI : Algebra K K[n√a] := inferInstance
have hn := Nat.pos_iff_ne_zero.mpr (ne_zero_of_irreducible_X_pow_sub_C H)
by_cases hn' : n = 1
· rw [hn', pow_one]; exact separable_X_sub_C
have ⟨ζ, hζ⟩ := hζ
rw [mem_primitiveRoots (Nat.pos_of_ne_zero <| ne_zero_of_irreducible_X_pow_sub_C H)] at hζ
rw [← separable_map (algebraMap K K[n√a]), Polynomial.map_sub, Polynomial.map_pow, map_C, map_X,
AdjoinRoot.algebraMap_eq,
X_pow_sub_C_eq_prod (hζ.map_of_injective (algebraMap K _).injective) hn
(root_X_pow_sub_C_pow n a), separable_prod_X_sub_C_iff']
#adaptation_note /-- https://github.com/leanprover/lean4/pull/5376
we need to provide this helper instance. -/
have : MonoidHomClass (K →+* K[n√a]) K K[n√a] := inferInstance
exact (hζ.map_of_injective (algebraMap K K[n√a]).injective).injOn_pow_mul
(root_X_pow_sub_C_ne_zero (lt_of_le_of_ne (show 1 ≤ n from hn) (Ne.symm hn')) _)
variable (n)
/-- The natural embedding of the roots of unity of `K` into `Gal(K[ⁿ√a]/K)`, by sending
`η ↦ (ⁿ√a ↦ η • ⁿ√a)`. Also see `autAdjoinRootXPowSubC` for the `AlgEquiv` version. -/
noncomputable
def autAdjoinRootXPowSubCHom :
rootsOfUnity n K →* (K[n√a] →ₐ[K] K[n√a]) where
toFun := fun η ↦ liftHom (X ^ n - C a) (((η : Kˣ) : K) • (root _) : K[n√a]) <| by
have := (mem_rootsOfUnity' _ _).mp η.prop
rw [map_sub, map_pow, aeval_C, aeval_X, Algebra.smul_def, mul_pow, root_X_pow_sub_C_pow,
AdjoinRoot.algebraMap_eq, ← map_pow, this, map_one, one_mul, sub_self]
map_one' := algHom_ext <| by simp
map_mul' := fun ε η ↦ algHom_ext <| by simp [mul_smul, smul_comm ((ε : Kˣ) : K)]
/-- The natural embedding of the roots of unity of `K` into `Gal(K[ⁿ√a]/K)`, by sending
`η ↦ (ⁿ√a ↦ η • ⁿ√a)`. This is an isomorphism when `K` contains a primitive root of unity.
See `autAdjoinRootXPowSubCEquiv`. -/
noncomputable
def autAdjoinRootXPowSubC :
rootsOfUnity n K →* (K[n√a] ≃ₐ[K] K[n√a]) :=
(AlgEquiv.algHomUnitsEquiv _ _).toMonoidHom.comp (autAdjoinRootXPowSubCHom n a).toHomUnits
variable {n}
lemma autAdjoinRootXPowSubC_root (η) :
autAdjoinRootXPowSubC n a η (root _) = ((η : Kˣ) : K) • root _ := by
dsimp [autAdjoinRootXPowSubC, autAdjoinRootXPowSubCHom, AlgEquiv.algHomUnitsEquiv]
apply liftHom_root
variable {a}
/-- The inverse function of `autAdjoinRootXPowSubC` if `K` has all roots of unity.
See `autAdjoinRootXPowSubCEquiv`. -/
noncomputable
def AdjoinRootXPowSubCEquivToRootsOfUnity [NeZero n] (σ : K[n√a] ≃ₐ[K] K[n√a]) :
rootsOfUnity n K :=
letI := Fact.mk H
letI : IsDomain K[n√a] := inferInstance
letI := Classical.decEq K
(rootsOfUnityEquivOfPrimitiveRoots (n := n) (algebraMap K K[n√a]).injective hζ).symm
(rootsOfUnity.mkOfPowEq (if a = 0 then 1 else σ (root _) / root _) (by
-- The if is needed in case `n = 1` and `a = 0` and `K[n√a] = K`.
split
· exact one_pow _
rw [div_pow, ← map_pow]
simp only [root_X_pow_sub_C_pow, ← AdjoinRoot.algebraMap_eq, AlgEquiv.commutes]
rw [div_self]
rwa [Ne, map_eq_zero_iff _ (algebraMap K _).injective]))
/-- The equivalence between the roots of unity of `K` and `Gal(K[ⁿ√a]/K)`. -/
noncomputable
def autAdjoinRootXPowSubCEquiv [NeZero n] :
rootsOfUnity n K ≃* (K[n√a] ≃ₐ[K] K[n√a]) where
__ := autAdjoinRootXPowSubC n a
invFun := AdjoinRootXPowSubCEquivToRootsOfUnity hζ H
left_inv := by
intro η
have := Fact.mk H
have : IsDomain K[n√a] := inferInstance
letI : Algebra K K[n√a] := inferInstance
apply (rootsOfUnityEquivOfPrimitiveRoots (algebraMap K K[n√a]).injective hζ).injective
ext
simp only [AdjoinRoot.algebraMap_eq, OneHom.toFun_eq_coe, MonoidHom.toOneHom_coe,
autAdjoinRootXPowSubC_root, Algebra.smul_def, ne_eq, MulEquiv.apply_symm_apply,
rootsOfUnity.val_mkOfPowEq_coe, val_rootsOfUnityEquivOfPrimitiveRoots_apply_coe,
AdjoinRootXPowSubCEquivToRootsOfUnity]
split_ifs with h
· obtain rfl := not_imp_not.mp (fun hn ↦ ne_zero_of_irreducible_X_pow_sub_C' hn H) h
have : (η : Kˣ) = 1 := (pow_one _).symm.trans η.prop
simp only [this, Units.val_one, map_one]
· exact mul_div_cancel_right₀ _ (root_X_pow_sub_C_ne_zero' (NeZero.pos n) h)
right_inv := by
intro e
have := Fact.mk H
letI : Algebra K K[n√a] := inferInstance
apply AlgEquiv.coe_algHom_injective
apply AdjoinRoot.algHom_ext
simp only [AdjoinRootXPowSubCEquivToRootsOfUnity, AdjoinRoot.algebraMap_eq, OneHom.toFun_eq_coe,
MonoidHom.toOneHom_coe, AlgHom.coe_coe, autAdjoinRootXPowSubC_root, Algebra.smul_def]
rw [rootsOfUnityEquivOfPrimitiveRoots_symm_apply, rootsOfUnity.val_mkOfPowEq_coe]
split_ifs with h
· obtain rfl := not_imp_not.mp (fun hn ↦ ne_zero_of_irreducible_X_pow_sub_C' hn H) h
rw [(pow_one _).symm.trans (root_X_pow_sub_C_pow 1 a), one_mul,
← AdjoinRoot.algebraMap_eq, AlgEquiv.commutes]
· refine div_mul_cancel₀ _ (root_X_pow_sub_C_ne_zero' (NeZero.pos n) h)
lemma autAdjoinRootXPowSubCEquiv_root [NeZero n] (η) :
autAdjoinRootXPowSubCEquiv hζ H η (root _) = ((η : Kˣ) : K) • root _ :=
autAdjoinRootXPowSubC_root a η
lemma autAdjoinRootXPowSubCEquiv_symm_smul [NeZero n] (σ) :
((autAdjoinRootXPowSubCEquiv hζ H).symm σ : Kˣ) • (root _ : K[n√a]) = σ (root _) := by
have := Fact.mk H
simp only [autAdjoinRootXPowSubCEquiv, OneHom.toFun_eq_coe, MonoidHom.toOneHom_coe,
MulEquiv.symm_mk, MulEquiv.coe_mk, Equiv.coe_fn_symm_mk, AdjoinRootXPowSubCEquivToRootsOfUnity,
AdjoinRoot.algebraMap_eq, rootsOfUnity.mkOfPowEq, Units.smul_def, Algebra.smul_def,
rootsOfUnityEquivOfPrimitiveRoots_symm_apply, Units.val_ofPowEqOne, ite_mul, one_mul]
simp_rw [← root_X_pow_sub_C_eq_zero_iff H]
split_ifs with h
· rw [h, map_zero]
· rw [div_mul_cancel₀ _ h]
end AdjoinRoot
/-! ### Galois Group of `IsSplittingField K L (X ^ n - C a)` -/
section IsSplittingField
variable {a}
variable {L : Type*} [Field L] [Algebra K L] [IsSplittingField K L (X ^ n - C a)]
include hζ in
lemma isSplittingField_AdjoinRoot_X_pow_sub_C :
haveI := Fact.mk H
letI : Algebra K K[n√a] := inferInstance
IsSplittingField K K[n√a] (X ^ n - C a) := by
have := Fact.mk H
letI : Algebra K K[n√a] := inferInstance
constructor
· rw [← splits_id_iff_splits, Polynomial.map_sub, Polynomial.map_pow, Polynomial.map_C,
Polynomial.map_X]
have ⟨_, hζ⟩ := hζ
rw [mem_primitiveRoots (Nat.pos_of_ne_zero <| ne_zero_of_irreducible_X_pow_sub_C H)] at hζ
exact X_pow_sub_C_splits_of_isPrimitiveRoot (hζ.map_of_injective (algebraMap K _).injective)
(root_X_pow_sub_C_pow n a)
· rw [eq_top_iff, ← AdjoinRoot.adjoinRoot_eq_top]
apply Algebra.adjoin_mono
have := ne_zero_of_irreducible_X_pow_sub_C H
rw [Set.singleton_subset_iff, mem_rootSet_of_ne (X_pow_sub_C_ne_zero
(Nat.pos_of_ne_zero this) a), aeval_def, AdjoinRoot.algebraMap_eq, AdjoinRoot.eval₂_root]
variable {α : L} (hα : α ^ n = algebraMap K L a)
/-- Suppose `L/K` is the splitting field of `Xⁿ - a`, then a choice of `ⁿ√a` gives an equivalence of
`L` with `K[n√a]`. -/
noncomputable
def adjoinRootXPowSubCEquiv (hζ : (primitiveRoots n K).Nonempty) (H : Irreducible (X ^ n - C a))
(hα : α ^ n = algebraMap K L a) : K[n√a] ≃ₐ[K] L :=
AlgEquiv.ofBijective (AdjoinRoot.liftHom (X ^ n - C a) α (by simp [hα])) <| by
haveI := Fact.mk H
letI := isSplittingField_AdjoinRoot_X_pow_sub_C hζ H
refine ⟨(liftHom (X ^ n - C a) α _).injective, ?_⟩
rw [← AlgHom.range_eq_top, ← IsSplittingField.adjoin_rootSet _ (X ^ n - C a),
eq_comm, adjoin_rootSet_eq_range, IsSplittingField.adjoin_rootSet]
exact IsSplittingField.splits _ _
lemma adjoinRootXPowSubCEquiv_root :
adjoinRootXPowSubCEquiv hζ H hα (root _) = α := by
rw [adjoinRootXPowSubCEquiv, AlgEquiv.coe_ofBijective, liftHom_root]
lemma adjoinRootXPowSubCEquiv_symm_eq_root :
(adjoinRootXPowSubCEquiv hζ H hα).symm α = root _ := by
apply (adjoinRootXPowSubCEquiv hζ H hα).injective
rw [(adjoinRootXPowSubCEquiv hζ H hα).apply_symm_apply, adjoinRootXPowSubCEquiv_root]
include hζ H hα in
lemma Algebra.adjoin_root_eq_top_of_isSplittingField :
Algebra.adjoin K {α} = ⊤ := by
apply Subalgebra.map_injective (B := K[n√a]) (f := (adjoinRootXPowSubCEquiv hζ H hα).symm)
(adjoinRootXPowSubCEquiv hζ H hα).symm.injective
rw [Algebra.map_top, (AlgHom.range_eq_top _).mpr
(adjoinRootXPowSubCEquiv hζ H hα).symm.surjective, AlgHom.map_adjoin,
Set.image_singleton, AlgHom.coe_coe, adjoinRootXPowSubCEquiv_symm_eq_root, adjoinRoot_eq_top]
include hζ H hα in
lemma IntermediateField.adjoin_root_eq_top_of_isSplittingField :
K⟮α⟯ = ⊤ := by
refine (IntermediateField.eq_adjoin_of_eq_algebra_adjoin _ _ _ ?_).symm
exact (Algebra.adjoin_root_eq_top_of_isSplittingField hζ H hα).symm
variable (a) (L)
/-- An arbitrary choice of `ⁿ√a` in the splitting field of `Xⁿ - a`. -/
noncomputable
abbrev rootOfSplitsXPowSubC (hn : 0 < n) (a : K)
(L) [Field L] [Algebra K L] [IsSplittingField K L (X ^ n - C a)] : L :=
(rootOfSplits _ (IsSplittingField.splits L (X ^ n - C a))
(by simpa [degree_X_pow_sub_C hn] using Nat.pos_iff_ne_zero.mp hn))
lemma rootOfSplitsXPowSubC_pow [NeZero n] :
(rootOfSplitsXPowSubC (NeZero.pos n) a L) ^ n = algebraMap K L a := by
have := map_rootOfSplits _ (IsSplittingField.splits L (X ^ n - C a))
simp only [eval₂_sub, eval₂_X_pow, eval₂_C, sub_eq_zero] at this
exact this _
variable {a}
/-- Suppose `L/K` is the splitting field of `Xⁿ - a`, then `Gal(L/K)` is isomorphic to the
roots of unity in `K` if `K` contains all of them.
Note that this does not depend on a choice of `ⁿ√a`. -/
noncomputable
def autEquivRootsOfUnity [NeZero n] :
(L ≃ₐ[K] L) ≃* (rootsOfUnity n K) :=
(AlgEquiv.autCongr (adjoinRootXPowSubCEquiv hζ H (rootOfSplitsXPowSubC_pow a L)).symm).trans
(autAdjoinRootXPowSubCEquiv hζ H).symm
lemma autEquivRootsOfUnity_apply_rootOfSplit [NeZero n] (σ : L ≃ₐ[K] L) :
σ (rootOfSplitsXPowSubC (NeZero.pos n) a L) =
autEquivRootsOfUnity hζ H L σ • (rootOfSplitsXPowSubC (NeZero.pos n) a L) := by
obtain ⟨η, rfl⟩ := (autEquivRootsOfUnity hζ H L).symm.surjective σ
rw [MulEquiv.apply_symm_apply, autEquivRootsOfUnity]
simp only [MulEquiv.symm_trans_apply, AlgEquiv.autCongr_symm, AlgEquiv.symm_symm,
MulEquiv.symm_symm, AlgEquiv.autCongr_apply, AlgEquiv.trans_apply,
adjoinRootXPowSubCEquiv_symm_eq_root, autAdjoinRootXPowSubCEquiv_root, map_smul,
adjoinRootXPowSubCEquiv_root]
rfl
include hα in
lemma autEquivRootsOfUnity_smul [NeZero n] (σ : L ≃ₐ[K] L) :
autEquivRootsOfUnity hζ H L σ • α = σ α := by
have ⟨ζ, hζ'⟩ := hζ
have hn := NeZero.pos n
rw [mem_primitiveRoots hn] at hζ'
rw [← mem_nthRoots hn, (hζ'.map_of_injective (algebraMap K L).injective).nthRoots_eq
(rootOfSplitsXPowSubC_pow a L)] at hα
simp only [Finset.range_val, Multiset.mem_map, Multiset.mem_range] at hα
obtain ⟨i, _, rfl⟩ := hα
simp only [map_mul, ← map_pow, ← Algebra.smul_def, map_smul,
autEquivRootsOfUnity_apply_rootOfSplit hζ H L]
exact smul_comm _ _ _
/-- Suppose `L/K` is the splitting field of `Xⁿ - a`, and `ζ` is a `n`-th primitive root of unity
in `K`, then `Gal(L/K)` is isomorphic to `ZMod n`. -/
noncomputable
def autEquivZmod [NeZero n] {ζ : K} (hζ : IsPrimitiveRoot ζ n) :
(L ≃ₐ[K] L) ≃* Multiplicative (ZMod n) :=
haveI hn := Nat.pos_iff_ne_zero.mpr (ne_zero_of_irreducible_X_pow_sub_C H)
(autEquivRootsOfUnity ⟨ζ, (mem_primitiveRoots hn).mpr hζ⟩ H L).trans
((MulEquiv.subgroupCongr (IsPrimitiveRoot.zpowers_eq
(hζ.isUnit_unit' hn)).symm).trans (AddEquiv.toMultiplicative'
(hζ.isUnit_unit' hn).zmodEquivZPowers.symm))
include hα in
lemma autEquivZmod_symm_apply_intCast [NeZero n] {ζ : K} (hζ : IsPrimitiveRoot ζ n) (m : ℤ) :
(autEquivZmod H L hζ).symm (Multiplicative.ofAdd (m : ZMod n)) α = ζ ^ m • α := by
have hn := Nat.pos_iff_ne_zero.mpr (ne_zero_of_irreducible_X_pow_sub_C H)
rw [← autEquivRootsOfUnity_smul ⟨ζ, (mem_primitiveRoots hn).mpr hζ⟩ H L hα]
simp [MulEquiv.subgroupCongr_symm_apply, Subgroup.smul_def, Units.smul_def, autEquivZmod]
include hα in
lemma autEquivZmod_symm_apply_natCast [NeZero n] {ζ : K} (hζ : IsPrimitiveRoot ζ n) (m : ℕ) :
(autEquivZmod H L hζ).symm (Multiplicative.ofAdd (m : ZMod n)) α = ζ ^ m • α := by
simpa only [Int.cast_natCast, zpow_natCast] using autEquivZmod_symm_apply_intCast H L hα hζ m
include hζ H in
lemma isCyclic_of_isSplittingField_X_pow_sub_C [NeZero n] : IsCyclic (L ≃ₐ[K] L) :=
have hn := Nat.pos_iff_ne_zero.mpr (ne_zero_of_irreducible_X_pow_sub_C H)
isCyclic_of_surjective _
(autEquivZmod H _ <| (mem_primitiveRoots hn).mp hζ.choose_spec).symm.surjective
include hζ H in
lemma isGalois_of_isSplittingField_X_pow_sub_C : IsGalois K L :=
IsGalois.of_separable_splitting_field (separable_X_pow_sub_C_of_irreducible hζ a H)
include hζ H in
lemma finrank_of_isSplittingField_X_pow_sub_C : Module.finrank K L = n := by
have := Polynomial.IsSplittingField.finiteDimensional L (X ^ n - C a)
have := isGalois_of_isSplittingField_X_pow_sub_C hζ H L
have hn := Nat.pos_iff_ne_zero.mpr (ne_zero_of_irreducible_X_pow_sub_C H)
have : NeZero n := ⟨ne_zero_of_irreducible_X_pow_sub_C H⟩
rw [← IsGalois.card_aut_eq_finrank, Fintype.card_congr ((autEquivZmod H L <|
(mem_primitiveRoots hn).mp hζ.choose_spec).toEquiv.trans Multiplicative.toAdd), ZMod.card]
end IsSplittingField
/-! ### Cyclic extensions of order `n` when `K` has all `n`-th roots of unity. -/
section IsCyclic
variable {L} [Field L] [Algebra K L] [FiniteDimensional K L]
variable (hK : (primitiveRoots (Module.finrank K L) K).Nonempty)
open Module
variable (K L)
include hK in
/-- If `L/K` is a cyclic extension of degree `n`, and `K` contains all `n`-th roots of unity,
then `L = K[α]` for some `α ^ n ∈ K`. -/
lemma exists_root_adjoin_eq_top_of_isCyclic [IsGalois K L] [IsCyclic (L ≃ₐ[K] L)] :
∃ (α : L), α ^ (finrank K L) ∈ Set.range (algebraMap K L) ∧ K⟮α⟯ = ⊤ := by
-- Let `ζ` be an `n`-th root of unity, and `σ` be a generator of `L ≃ₐ[K] L`.
have ⟨ζ, hζ⟩ := hK
rw [mem_primitiveRoots finrank_pos] at hζ
obtain ⟨σ, hσ⟩ := ‹IsCyclic (L ≃ₐ[K] L)›
have hσ' := orderOf_eq_card_of_forall_mem_zpowers hσ
-- Since the minimal polynomial of `σ` over `K` is `Xⁿ - 1`,
-- `σ` has an eigenvector `v` with eigenvalue `ζ`.
have : IsRoot (minpoly K σ.toLinearMap) ζ := by
simpa [minpoly_algEquiv_toLinearMap σ (isOfFinOrder_of_finite σ), hσ',
sub_eq_zero, IsGalois.card_aut_eq_finrank] using hζ.pow_eq_one
obtain ⟨v, hv⟩ := (Module.End.hasEigenvalue_of_isRoot this).exists_hasEigenvector
have hv' := hv.pow_apply
simp_rw [← AlgEquiv.pow_toLinearMap, AlgEquiv.toLinearMap_apply] at hv'
-- We claim that `v` is the desired root.
refine ⟨v, ?_, ?_⟩
· -- Since `v ^ n` is fixed by `σ` (`σ (v ^ n) = ζ ^ n • v ^ n = v ^ n`), it is in `K`.
rw [← IntermediateField.mem_bot,
← OrderIso.map_bot IsGalois.intermediateFieldEquivSubgroup.symm]
intro ⟨σ', hσ'⟩
obtain ⟨n, rfl : σ ^ n = σ'⟩ := mem_powers_iff_mem_zpowers.mpr (hσ σ')
rw [smul_pow', Submonoid.smul_def, AlgEquiv.smul_def, hv', smul_pow, ← pow_mul,
mul_comm, pow_mul, hζ.pow_eq_one, one_pow, one_smul]
· -- Since `σ` does not fix `K⟮α⟯`, `K⟮α⟯` is `L`.
apply IsGalois.intermediateFieldEquivSubgroup.injective
rw [map_top, eq_top_iff]
intros σ' hσ'
obtain ⟨n, rfl : σ ^ n = σ'⟩ := mem_powers_iff_mem_zpowers.mpr (hσ σ')
have := hσ' ⟨v, IntermediateField.mem_adjoin_simple_self K v⟩
simp only [AlgEquiv.smul_def, hv'] at this
conv_rhs at this => rw [← one_smul K v]
obtain ⟨k, rfl⟩ := hζ.dvd_of_pow_eq_one n (smul_left_injective K hv.2 this)
rw [pow_mul, ← IsGalois.card_aut_eq_finrank, pow_card_eq_one, one_pow]
exact one_mem _
variable {K L}
lemma irreducible_X_pow_sub_C_of_root_adjoin_eq_top
{a : K} {α : L} (ha : α ^ (finrank K L) = algebraMap K L a) (hα : K⟮α⟯ = ⊤) :
Irreducible (X ^ (finrank K L) - C a) := by
have : X ^ (finrank K L) - C a = minpoly K α := by
refine minpoly.unique _ _ (monic_X_pow_sub_C _ finrank_pos.ne.symm) ?_ ?_
· simp only [aeval_def, eval₂_sub, eval₂_X_pow, ha, eval₂_C, sub_self]
· intros q hq hq'
refine le_trans ?_ (degree_le_of_dvd (minpoly.dvd _ _ hq') hq.ne_zero)
rw [degree_X_pow_sub_C finrank_pos,
degree_eq_natDegree (minpoly.ne_zero (IsIntegral.of_finite K α)),
← IntermediateField.adjoin.finrank (IsIntegral.of_finite K α), hα, Nat.cast_le]
exact (finrank_top K L).ge
exact this ▸ minpoly.irreducible (IsIntegral.of_finite K α)
include hK in
lemma isSplittingField_X_pow_sub_C_of_root_adjoin_eq_top
{a : K} {α : L} (ha : α ^ (finrank K L) = algebraMap K L a) (hα : K⟮α⟯ = ⊤) :
IsSplittingField K L (X ^ (finrank K L) - C a) := by
constructor
· rw [← splits_id_iff_splits, Polynomial.map_sub, Polynomial.map_pow, Polynomial.map_C,
Polynomial.map_X]
have ⟨_, hζ⟩ := hK
rw [mem_primitiveRoots finrank_pos] at hζ
exact X_pow_sub_C_splits_of_isPrimitiveRoot (hζ.map_of_injective (algebraMap K _).injective) ha
· rw [eq_top_iff, ← IntermediateField.top_toSubalgebra, ← hα,
IntermediateField.adjoin_simple_toSubalgebra_of_integral (IsIntegral.of_finite K α)]
apply Algebra.adjoin_mono
rw [Set.singleton_subset_iff, mem_rootSet_of_ne (X_pow_sub_C_ne_zero finrank_pos a),
aeval_def, eval₂_sub, eval₂_X_pow, eval₂_C, ha, sub_self]
end IsCyclic
open Module in
/--
Suppose `L/K` is a finite extension of dimension `n`, and `K` contains all `n`-th roots of unity.
Then `L/K` is cyclic iff
`L` is a splitting field of some irreducible polynomial of the form `Xⁿ - a : K[X]` iff
`L = K[α]` for some `αⁿ ∈ K`.
-/
lemma isCyclic_tfae (K L) [Field K] [Field L] [Algebra K L] [FiniteDimensional K L]
(hK : (primitiveRoots (Module.finrank K L) K).Nonempty) :
List.TFAE [
IsGalois K L ∧ IsCyclic (L ≃ₐ[K] L),
∃ a : K, Irreducible (X ^ (finrank K L) - C a) ∧
IsSplittingField K L (X ^ (finrank K L) - C a),
∃ (α : L), α ^ (finrank K L) ∈ Set.range (algebraMap K L) ∧ K⟮α⟯ = ⊤] := by
have : NeZero (Module.finrank K L) := NeZero.of_pos finrank_pos
tfae_have 1 → 3
| ⟨inst₁, inst₂⟩ => exists_root_adjoin_eq_top_of_isCyclic K L hK
tfae_have 3 → 2
| ⟨α, ⟨a, ha⟩, hα⟩ => ⟨a, irreducible_X_pow_sub_C_of_root_adjoin_eq_top ha.symm hα,
isSplittingField_X_pow_sub_C_of_root_adjoin_eq_top hK ha.symm hα⟩
tfae_have 2 → 1
| ⟨a, H, inst⟩ => ⟨isGalois_of_isSplittingField_X_pow_sub_C hK H L,
isCyclic_of_isSplittingField_X_pow_sub_C hK H L⟩
tfae_finish
| Mathlib/FieldTheory/KummerExtension.lean | 616 | 640 | |
/-
Copyright (c) 2017 Johannes Hölzl. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johannes Hölzl, Mario Carneiro
-/
import Mathlib.Topology.Continuous
import Mathlib.Topology.Defs.Induced
/-!
# Ordering on topologies and (co)induced topologies
Topologies on a fixed type `α` are ordered, by reverse inclusion. That is, for topologies `t₁` and
`t₂` on `α`, we write `t₁ ≤ t₂` if every set open in `t₂` is also open in `t₁`. (One also calls
`t₁` *finer* than `t₂`, and `t₂` *coarser* than `t₁`.)
Any function `f : α → β` induces
* `TopologicalSpace.induced f : TopologicalSpace β → TopologicalSpace α`;
* `TopologicalSpace.coinduced f : TopologicalSpace α → TopologicalSpace β`.
Continuity, the ordering on topologies and (co)induced topologies are related as follows:
* The identity map `(α, t₁) → (α, t₂)` is continuous iff `t₁ ≤ t₂`.
* A map `f : (α, t) → (β, u)` is continuous
* iff `t ≤ TopologicalSpace.induced f u` (`continuous_iff_le_induced`)
* iff `TopologicalSpace.coinduced f t ≤ u` (`continuous_iff_coinduced_le`).
Topologies on `α` form a complete lattice, with `⊥` the discrete topology and `⊤` the indiscrete
topology.
For a function `f : α → β`, `(TopologicalSpace.coinduced f, TopologicalSpace.induced f)` is a Galois
connection between topologies on `α` and topologies on `β`.
## Implementation notes
There is a Galois insertion between topologies on `α` (with the inclusion ordering) and all
collections of sets in `α`. The complete lattice structure on topologies on `α` is defined as the
reverse of the one obtained via this Galois insertion. More precisely, we use the corresponding
Galois coinsertion between topologies on `α` (with the reversed inclusion ordering) and collections
of sets in `α` (with the reversed inclusion ordering).
## Tags
finer, coarser, induced topology, coinduced topology
-/
open Function Set Filter Topology
universe u v w
namespace TopologicalSpace
variable {α : Type u}
/-- The open sets of the least topology containing a collection of basic sets. -/
inductive GenerateOpen (g : Set (Set α)) : Set α → Prop
| basic : ∀ s ∈ g, GenerateOpen g s
| univ : GenerateOpen g univ
| inter : ∀ s t, GenerateOpen g s → GenerateOpen g t → GenerateOpen g (s ∩ t)
| sUnion : ∀ S : Set (Set α), (∀ s ∈ S, GenerateOpen g s) → GenerateOpen g (⋃₀ S)
/-- The smallest topological space containing the collection `g` of basic sets -/
def generateFrom (g : Set (Set α)) : TopologicalSpace α where
IsOpen := GenerateOpen g
isOpen_univ := GenerateOpen.univ
isOpen_inter := GenerateOpen.inter
isOpen_sUnion := GenerateOpen.sUnion
theorem isOpen_generateFrom_of_mem {g : Set (Set α)} {s : Set α} (hs : s ∈ g) :
IsOpen[generateFrom g] s :=
GenerateOpen.basic s hs
theorem nhds_generateFrom {g : Set (Set α)} {a : α} :
@nhds α (generateFrom g) a = ⨅ s ∈ { s | a ∈ s ∧ s ∈ g }, 𝓟 s := by
letI := generateFrom g
rw [nhds_def]
refine le_antisymm (biInf_mono fun s ⟨as, sg⟩ => ⟨as, .basic _ sg⟩) <| le_iInf₂ ?_
rintro s ⟨ha, hs⟩
induction hs with
| basic _ hs => exact iInf₂_le _ ⟨ha, hs⟩
| univ => exact le_top.trans_eq principal_univ.symm
| inter _ _ _ _ hs ht => exact (le_inf (hs ha.1) (ht ha.2)).trans_eq inf_principal
| sUnion _ _ hS =>
let ⟨t, htS, hat⟩ := ha
exact (hS t htS hat).trans (principal_mono.2 <| subset_sUnion_of_mem htS)
lemma tendsto_nhds_generateFrom_iff {β : Type*} {m : α → β} {f : Filter α} {g : Set (Set β)}
{b : β} : Tendsto m f (@nhds β (generateFrom g) b) ↔ ∀ s ∈ g, b ∈ s → m ⁻¹' s ∈ f := by
simp only [nhds_generateFrom, @forall_swap (b ∈ _), tendsto_iInf, mem_setOf_eq, and_imp,
tendsto_principal]; rfl
/-- Construct a topology on α given the filter of neighborhoods of each point of α. -/
protected def mkOfNhds (n : α → Filter α) : TopologicalSpace α where
IsOpen s := ∀ a ∈ s, s ∈ n a
isOpen_univ _ _ := univ_mem
isOpen_inter := fun _s _t hs ht x ⟨hxs, hxt⟩ => inter_mem (hs x hxs) (ht x hxt)
isOpen_sUnion := fun _s hs _a ⟨x, hx, hxa⟩ =>
mem_of_superset (hs x hx _ hxa) (subset_sUnion_of_mem hx)
theorem nhds_mkOfNhds_of_hasBasis {n : α → Filter α} {ι : α → Sort*} {p : ∀ a, ι a → Prop}
{s : ∀ a, ι a → Set α} (hb : ∀ a, (n a).HasBasis (p a) (s a))
(hpure : ∀ a i, p a i → a ∈ s a i) (hopen : ∀ a i, p a i → ∀ᶠ x in n a, s a i ∈ n x) (a : α) :
@nhds α (.mkOfNhds n) a = n a := by
let t : TopologicalSpace α := .mkOfNhds n
apply le_antisymm
· intro U hU
replace hpure : pure ≤ n := fun x ↦ (hb x).ge_iff.2 (hpure x)
refine mem_nhds_iff.2 ⟨{x | U ∈ n x}, fun x hx ↦ hpure x hx, fun x hx ↦ ?_, hU⟩
rcases (hb x).mem_iff.1 hx with ⟨i, hpi, hi⟩
exact (hopen x i hpi).mono fun y hy ↦ mem_of_superset hy hi
· exact (nhds_basis_opens a).ge_iff.2 fun U ⟨haU, hUo⟩ ↦ hUo a haU
theorem nhds_mkOfNhds (n : α → Filter α) (a : α) (h₀ : pure ≤ n)
(h₁ : ∀ a, ∀ s ∈ n a, ∀ᶠ y in n a, s ∈ n y) :
@nhds α (TopologicalSpace.mkOfNhds n) a = n a :=
nhds_mkOfNhds_of_hasBasis (fun a ↦ (n a).basis_sets) h₀ h₁ _
theorem nhds_mkOfNhds_single [DecidableEq α] {a₀ : α} {l : Filter α} (h : pure a₀ ≤ l) (b : α) :
@nhds α (TopologicalSpace.mkOfNhds (update pure a₀ l)) b =
(update pure a₀ l : α → Filter α) b := by
refine nhds_mkOfNhds _ _ (le_update_iff.mpr ⟨h, fun _ _ => le_rfl⟩) fun a s hs => ?_
rcases eq_or_ne a a₀ with (rfl | ha)
· filter_upwards [hs] with b hb
rcases eq_or_ne b a with (rfl | hb)
· exact hs
· rwa [update_of_ne hb]
· simpa only [update_of_ne ha, mem_pure, eventually_pure] using hs
theorem nhds_mkOfNhds_filterBasis (B : α → FilterBasis α) (a : α) (h₀ : ∀ x, ∀ n ∈ B x, x ∈ n)
(h₁ : ∀ x, ∀ n ∈ B x, ∃ n₁ ∈ B x, ∀ x' ∈ n₁, ∃ n₂ ∈ B x', n₂ ⊆ n) :
@nhds α (TopologicalSpace.mkOfNhds fun x => (B x).filter) a = (B a).filter :=
nhds_mkOfNhds_of_hasBasis (fun a ↦ (B a).hasBasis) h₀ h₁ a
section Lattice
variable {α : Type u} {β : Type v}
/-- The ordering on topologies on the type `α`. `t ≤ s` if every set open in `s` is also open in `t`
(`t` is finer than `s`). -/
instance : PartialOrder (TopologicalSpace α) :=
{ PartialOrder.lift (fun t => OrderDual.toDual IsOpen[t]) (fun _ _ => TopologicalSpace.ext) with
le := fun s t => ∀ U, IsOpen[t] U → IsOpen[s] U }
protected theorem le_def {α} {t s : TopologicalSpace α} : t ≤ s ↔ IsOpen[s] ≤ IsOpen[t] :=
Iff.rfl
theorem le_generateFrom_iff_subset_isOpen {g : Set (Set α)} {t : TopologicalSpace α} :
t ≤ generateFrom g ↔ g ⊆ { s | IsOpen[t] s } :=
⟨fun ht s hs => ht _ <| .basic s hs, fun hg _s hs =>
hs.recOn (fun _ h => hg h) isOpen_univ (fun _ _ _ _ => IsOpen.inter) fun _ _ => isOpen_sUnion⟩
/-- If `s` equals the collection of open sets in the topology it generates, then `s` defines a
topology. -/
protected def mkOfClosure (s : Set (Set α)) (hs : { u | GenerateOpen s u } = s) :
TopologicalSpace α where
IsOpen u := u ∈ s
isOpen_univ := hs ▸ TopologicalSpace.GenerateOpen.univ
isOpen_inter := hs ▸ TopologicalSpace.GenerateOpen.inter
isOpen_sUnion := hs ▸ TopologicalSpace.GenerateOpen.sUnion
theorem mkOfClosure_sets {s : Set (Set α)} {hs : { u | GenerateOpen s u } = s} :
TopologicalSpace.mkOfClosure s hs = generateFrom s :=
TopologicalSpace.ext hs.symm
theorem gc_generateFrom (α) :
GaloisConnection (fun t : TopologicalSpace α => OrderDual.toDual { s | IsOpen[t] s })
(generateFrom ∘ OrderDual.ofDual) := fun _ _ =>
le_generateFrom_iff_subset_isOpen.symm
/-- The Galois coinsertion between `TopologicalSpace α` and `(Set (Set α))ᵒᵈ` whose lower part sends
a topology to its collection of open subsets, and whose upper part sends a collection of subsets
of `α` to the topology they generate. -/
def gciGenerateFrom (α : Type*) :
GaloisCoinsertion (fun t : TopologicalSpace α => OrderDual.toDual { s | IsOpen[t] s })
(generateFrom ∘ OrderDual.ofDual) where
gc := gc_generateFrom α
u_l_le _ s hs := TopologicalSpace.GenerateOpen.basic s hs
choice g hg := TopologicalSpace.mkOfClosure g
(Subset.antisymm hg <| le_generateFrom_iff_subset_isOpen.1 <| le_rfl)
choice_eq _ _ := mkOfClosure_sets
/-- Topologies on `α` form a complete lattice, with `⊥` the discrete topology
and `⊤` the indiscrete topology. The infimum of a collection of topologies
is the topology generated by all their open sets, while the supremum is the
topology whose open sets are those sets open in every member of the collection. -/
instance : CompleteLattice (TopologicalSpace α) := (gciGenerateFrom α).liftCompleteLattice
@[mono, gcongr]
theorem generateFrom_anti {α} {g₁ g₂ : Set (Set α)} (h : g₁ ⊆ g₂) :
generateFrom g₂ ≤ generateFrom g₁ :=
(gc_generateFrom _).monotone_u h
theorem generateFrom_setOf_isOpen (t : TopologicalSpace α) :
generateFrom { s | IsOpen[t] s } = t :=
(gciGenerateFrom α).u_l_eq t
theorem leftInverse_generateFrom :
LeftInverse generateFrom fun t : TopologicalSpace α => { s | IsOpen[t] s } :=
(gciGenerateFrom α).u_l_leftInverse
theorem generateFrom_surjective : Surjective (generateFrom : Set (Set α) → TopologicalSpace α) :=
(gciGenerateFrom α).u_surjective
theorem setOf_isOpen_injective : Injective fun t : TopologicalSpace α => { s | IsOpen[t] s } :=
(gciGenerateFrom α).l_injective
end Lattice
end TopologicalSpace
section Lattice
variable {α : Type*} {t t₁ t₂ : TopologicalSpace α} {s : Set α}
theorem IsOpen.mono (hs : IsOpen[t₂] s) (h : t₁ ≤ t₂) : IsOpen[t₁] s := h s hs
theorem IsClosed.mono (hs : IsClosed[t₂] s) (h : t₁ ≤ t₂) : IsClosed[t₁] s :=
(@isOpen_compl_iff α s t₁).mp <| hs.isOpen_compl.mono h
theorem closure.mono (h : t₁ ≤ t₂) : closure[t₁] s ⊆ closure[t₂] s :=
@closure_minimal _ t₁ s (@closure _ t₂ s) subset_closure (IsClosed.mono isClosed_closure h)
theorem isOpen_implies_isOpen_iff : (∀ s, IsOpen[t₁] s → IsOpen[t₂] s) ↔ t₂ ≤ t₁ :=
Iff.rfl
/-- The only open sets in the indiscrete topology are the empty set and the whole space. -/
theorem TopologicalSpace.isOpen_top_iff {α} (U : Set α) : IsOpen[⊤] U ↔ U = ∅ ∨ U = univ :=
⟨fun h => by
induction h with
| basic _ h => exact False.elim h
| univ => exact .inr rfl
| inter _ _ _ _ h₁ h₂ =>
rcases h₁ with (rfl | rfl) <;> rcases h₂ with (rfl | rfl) <;> simp
| sUnion _ _ ih => exact sUnion_mem_empty_univ ih, by
rintro (rfl | rfl)
exacts [@isOpen_empty _ ⊤, @isOpen_univ _ ⊤]⟩
/-- A topological space is discrete if every set is open, that is,
its topology equals the discrete topology `⊥`. -/
class DiscreteTopology (α : Type*) [t : TopologicalSpace α] : Prop where
/-- The `TopologicalSpace` structure on a type with discrete topology is equal to `⊥`. -/
eq_bot : t = ⊥
theorem discreteTopology_bot (α : Type*) : @DiscreteTopology α ⊥ :=
@DiscreteTopology.mk α ⊥ rfl
section DiscreteTopology
variable [TopologicalSpace α] [DiscreteTopology α] {β : Type*}
@[simp]
theorem isOpen_discrete (s : Set α) : IsOpen s := (@DiscreteTopology.eq_bot α _).symm ▸ trivial
@[simp] theorem isClosed_discrete (s : Set α) : IsClosed s := ⟨isOpen_discrete _⟩
theorem closure_discrete (s : Set α) : closure s = s := (isClosed_discrete _).closure_eq
@[simp] theorem dense_discrete {s : Set α} : Dense s ↔ s = univ := by simp [dense_iff_closure_eq]
@[simp]
theorem denseRange_discrete {ι : Type*} {f : ι → α} : DenseRange f ↔ Surjective f := by
rw [DenseRange, dense_discrete, range_eq_univ]
@[nontriviality, continuity, fun_prop]
theorem continuous_of_discreteTopology [TopologicalSpace β] {f : α → β} : Continuous f :=
continuous_def.2 fun _ _ => isOpen_discrete _
/-- A function to a discrete topological space is continuous if and only if the preimage of every
singleton is open. -/
theorem continuous_discrete_rng {α} [TopologicalSpace α] [TopologicalSpace β] [DiscreteTopology β]
{f : α → β} : Continuous f ↔ ∀ b : β, IsOpen (f ⁻¹' {b}) :=
⟨fun h _ => (isOpen_discrete _).preimage h, fun h => ⟨fun s _ => by
rw [← biUnion_of_singleton s, preimage_iUnion₂]
exact isOpen_biUnion fun _ _ => h _⟩⟩
@[simp]
theorem nhds_discrete (α : Type*) [TopologicalSpace α] [DiscreteTopology α] : @nhds α _ = pure :=
le_antisymm (fun _ s hs => (isOpen_discrete s).mem_nhds hs) pure_le_nhds
theorem mem_nhds_discrete {x : α} {s : Set α} :
s ∈ 𝓝 x ↔ x ∈ s := by rw [nhds_discrete, mem_pure]
end DiscreteTopology
theorem le_of_nhds_le_nhds (h : ∀ x, @nhds α t₁ x ≤ @nhds α t₂ x) : t₁ ≤ t₂ := fun s => by
rw [@isOpen_iff_mem_nhds _ t₁, @isOpen_iff_mem_nhds _ t₂]
exact fun hs a ha => h _ (hs _ ha)
theorem eq_bot_of_singletons_open {t : TopologicalSpace α} (h : ∀ x, IsOpen[t] {x}) : t = ⊥ :=
bot_unique fun s _ => biUnion_of_singleton s ▸ isOpen_biUnion fun x _ => h x
theorem forall_open_iff_discrete {X : Type*} [TopologicalSpace X] :
(∀ s : Set X, IsOpen s) ↔ DiscreteTopology X :=
⟨fun h => ⟨eq_bot_of_singletons_open fun _ => h _⟩, @isOpen_discrete _ _⟩
theorem discreteTopology_iff_forall_isClosed [TopologicalSpace α] :
DiscreteTopology α ↔ ∀ s : Set α, IsClosed s :=
forall_open_iff_discrete.symm.trans <| compl_surjective.forall.trans <| forall_congr' fun _ ↦
isOpen_compl_iff
theorem singletons_open_iff_discrete {X : Type*} [TopologicalSpace X] :
(∀ a : X, IsOpen ({a} : Set X)) ↔ DiscreteTopology X :=
⟨fun h => ⟨eq_bot_of_singletons_open h⟩, fun a _ => @isOpen_discrete _ _ a _⟩
theorem DiscreteTopology.of_finite_of_isClosed_singleton [TopologicalSpace α] [Finite α]
(h : ∀ a : α, IsClosed {a}) : DiscreteTopology α :=
discreteTopology_iff_forall_isClosed.mpr fun s ↦
s.iUnion_of_singleton_coe ▸ isClosed_iUnion_of_finite fun _ ↦ h _
theorem discreteTopology_iff_singleton_mem_nhds [TopologicalSpace α] :
DiscreteTopology α ↔ ∀ x : α, {x} ∈ 𝓝 x := by
simp only [← singletons_open_iff_discrete, isOpen_iff_mem_nhds, mem_singleton_iff, forall_eq]
| /-- This lemma characterizes discrete topological spaces as those whose singletons are
neighbourhoods. -/
| Mathlib/Topology/Order.lean | 314 | 315 |
/-
Copyright (c) 2016 Jeremy Avigad. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Jeremy Avigad
-/
import Mathlib.Algebra.Order.Ring.Abs
/-!
# Further lemmas about the integers
The distinction between this file and `Data.Int.Order.Basic` is not particularly clear.
They are separated by now to minimize the porting requirements for tactics during the transition to
mathlib4. Please feel free to reorganize these two files.
-/
open Function Nat
namespace Int
/-! ### nat abs -/
theorem natAbs_eq_iff_mul_self_eq {a b : ℤ} : a.natAbs = b.natAbs ↔ a * a = b * b := by
rw [← abs_eq_iff_mul_self_eq, abs_eq_natAbs, abs_eq_natAbs]
exact Int.natCast_inj.symm
theorem natAbs_lt_iff_mul_self_lt {a b : ℤ} : a.natAbs < b.natAbs ↔ a * a < b * b := by
rw [← abs_lt_iff_mul_self_lt, abs_eq_natAbs, abs_eq_natAbs]
exact Int.ofNat_lt.symm
theorem natAbs_le_iff_mul_self_le {a b : ℤ} : a.natAbs ≤ b.natAbs ↔ a * a ≤ b * b := by
rw [← abs_le_iff_mul_self_le, abs_eq_natAbs, abs_eq_natAbs]
exact Int.ofNat_le.symm
end Int
| Mathlib/Data/Int/Order/Lemmas.lean | 45 | 48 | |
/-
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, Johannes Hölzl, Mario Carneiro
-/
import Mathlib.Logic.Pairwise
import Mathlib.Data.Set.BooleanAlgebra
/-!
# The set lattice
This file is a collection of results on the complete atomic boolean algebra structure of `Set α`.
Notation for the complete lattice operations can be found in `Mathlib.Order.SetNotation`.
## Main declarations
* `Set.sInter_eq_biInter`, `Set.sUnion_eq_biInter`: Shows that `⋂₀ s = ⋂ x ∈ s, x` and
`⋃₀ s = ⋃ x ∈ s, x`.
* `Set.completeAtomicBooleanAlgebra`: `Set α` is a `CompleteAtomicBooleanAlgebra` with `≤ = ⊆`,
`< = ⊂`, `⊓ = ∩`, `⊔ = ∪`, `⨅ = ⋂`, `⨆ = ⋃` and `\` as the set difference.
See `Set.instBooleanAlgebra`.
* `Set.unionEqSigmaOfDisjoint`: Equivalence between `⋃ i, t i` and `Σ i, t i`, where `t` is an
indexed family of disjoint sets.
## Naming convention
In lemma names,
* `⋃ i, s i` is called `iUnion`
* `⋂ i, s i` is called `iInter`
* `⋃ i j, s i j` is called `iUnion₂`. This is an `iUnion` inside an `iUnion`.
* `⋂ i j, s i j` is called `iInter₂`. This is an `iInter` inside an `iInter`.
* `⋃ i ∈ s, t i` is called `biUnion` for "bounded `iUnion`". This is the special case of `iUnion₂`
where `j : i ∈ s`.
* `⋂ i ∈ s, t i` is called `biInter` for "bounded `iInter`". This is the special case of `iInter₂`
where `j : i ∈ s`.
## Notation
* `⋃`: `Set.iUnion`
* `⋂`: `Set.iInter`
* `⋃₀`: `Set.sUnion`
* `⋂₀`: `Set.sInter`
-/
open Function Set
universe u
variable {α β γ δ : Type*} {ι ι' ι₂ : Sort*} {κ κ₁ κ₂ : ι → Sort*} {κ' : ι' → Sort*}
namespace Set
/-! ### Complete lattice and complete Boolean algebra instances -/
theorem mem_iUnion₂ {x : γ} {s : ∀ i, κ i → Set γ} : (x ∈ ⋃ (i) (j), s i j) ↔ ∃ i j, x ∈ s i j := by
simp_rw [mem_iUnion]
theorem mem_iInter₂ {x : γ} {s : ∀ i, κ i → Set γ} : (x ∈ ⋂ (i) (j), s i j) ↔ ∀ i j, x ∈ s i j := by
simp_rw [mem_iInter]
theorem mem_iUnion_of_mem {s : ι → Set α} {a : α} (i : ι) (ha : a ∈ s i) : a ∈ ⋃ i, s i :=
mem_iUnion.2 ⟨i, ha⟩
theorem mem_iUnion₂_of_mem {s : ∀ i, κ i → Set α} {a : α} {i : ι} (j : κ i) (ha : a ∈ s i j) :
a ∈ ⋃ (i) (j), s i j :=
mem_iUnion₂.2 ⟨i, j, ha⟩
theorem mem_iInter_of_mem {s : ι → Set α} {a : α} (h : ∀ i, a ∈ s i) : a ∈ ⋂ i, s i :=
mem_iInter.2 h
theorem mem_iInter₂_of_mem {s : ∀ i, κ i → Set α} {a : α} (h : ∀ i j, a ∈ s i j) :
a ∈ ⋂ (i) (j), s i j :=
mem_iInter₂.2 h
/-! ### Union and intersection over an indexed family of sets -/
@[congr]
theorem iUnion_congr_Prop {p q : Prop} {f₁ : p → Set α} {f₂ : q → Set α} (pq : p ↔ q)
(f : ∀ x, f₁ (pq.mpr x) = f₂ x) : iUnion f₁ = iUnion f₂ :=
iSup_congr_Prop pq f
@[congr]
theorem iInter_congr_Prop {p q : Prop} {f₁ : p → Set α} {f₂ : q → Set α} (pq : p ↔ q)
(f : ∀ x, f₁ (pq.mpr x) = f₂ x) : iInter f₁ = iInter f₂ :=
iInf_congr_Prop pq f
theorem iUnion_plift_up (f : PLift ι → Set α) : ⋃ i, f (PLift.up i) = ⋃ i, f i :=
iSup_plift_up _
theorem iUnion_plift_down (f : ι → Set α) : ⋃ i, f (PLift.down i) = ⋃ i, f i :=
iSup_plift_down _
theorem iInter_plift_up (f : PLift ι → Set α) : ⋂ i, f (PLift.up i) = ⋂ i, f i :=
iInf_plift_up _
theorem iInter_plift_down (f : ι → Set α) : ⋂ i, f (PLift.down i) = ⋂ i, f i :=
iInf_plift_down _
theorem iUnion_eq_if {p : Prop} [Decidable p] (s : Set α) : ⋃ _ : p, s = if p then s else ∅ :=
iSup_eq_if _
theorem iUnion_eq_dif {p : Prop} [Decidable p] (s : p → Set α) :
⋃ h : p, s h = if h : p then s h else ∅ :=
iSup_eq_dif _
theorem iInter_eq_if {p : Prop} [Decidable p] (s : Set α) : ⋂ _ : p, s = if p then s else univ :=
iInf_eq_if _
theorem iInf_eq_dif {p : Prop} [Decidable p] (s : p → Set α) :
⋂ h : p, s h = if h : p then s h else univ :=
_root_.iInf_eq_dif _
theorem exists_set_mem_of_union_eq_top {ι : Type*} (t : Set ι) (s : ι → Set β)
(w : ⋃ i ∈ t, s i = ⊤) (x : β) : ∃ i ∈ t, x ∈ s i := by
have p : x ∈ ⊤ := Set.mem_univ x
rw [← w, Set.mem_iUnion] at p
simpa using p
theorem nonempty_of_union_eq_top_of_nonempty {ι : Type*} (t : Set ι) (s : ι → Set α)
(H : Nonempty α) (w : ⋃ i ∈ t, s i = ⊤) : t.Nonempty := by
obtain ⟨x, m, -⟩ := exists_set_mem_of_union_eq_top t s w H.some
exact ⟨x, m⟩
theorem nonempty_of_nonempty_iUnion
{s : ι → Set α} (h_Union : (⋃ i, s i).Nonempty) : Nonempty ι := by
obtain ⟨x, hx⟩ := h_Union
exact ⟨Classical.choose <| mem_iUnion.mp hx⟩
theorem nonempty_of_nonempty_iUnion_eq_univ
{s : ι → Set α} [Nonempty α] (h_Union : ⋃ i, s i = univ) : Nonempty ι :=
nonempty_of_nonempty_iUnion (s := s) (by simpa only [h_Union] using univ_nonempty)
theorem setOf_exists (p : ι → β → Prop) : { x | ∃ i, p i x } = ⋃ i, { x | p i x } :=
ext fun _ => mem_iUnion.symm
theorem setOf_forall (p : ι → β → Prop) : { x | ∀ i, p i x } = ⋂ i, { x | p i x } :=
ext fun _ => mem_iInter.symm
theorem iUnion_subset {s : ι → Set α} {t : Set α} (h : ∀ i, s i ⊆ t) : ⋃ i, s i ⊆ t :=
iSup_le h
theorem iUnion₂_subset {s : ∀ i, κ i → Set α} {t : Set α} (h : ∀ i j, s i j ⊆ t) :
⋃ (i) (j), s i j ⊆ t :=
iUnion_subset fun x => iUnion_subset (h x)
theorem subset_iInter {t : Set β} {s : ι → Set β} (h : ∀ i, t ⊆ s i) : t ⊆ ⋂ i, s i :=
le_iInf h
theorem subset_iInter₂ {s : Set α} {t : ∀ i, κ i → Set α} (h : ∀ i j, s ⊆ t i j) :
s ⊆ ⋂ (i) (j), t i j :=
subset_iInter fun x => subset_iInter <| h x
@[simp]
theorem iUnion_subset_iff {s : ι → Set α} {t : Set α} : ⋃ i, s i ⊆ t ↔ ∀ i, s i ⊆ t :=
⟨fun h _ => Subset.trans (le_iSup s _) h, iUnion_subset⟩
theorem iUnion₂_subset_iff {s : ∀ i, κ i → Set α} {t : Set α} :
⋃ (i) (j), s i j ⊆ t ↔ ∀ i j, s i j ⊆ t := by simp_rw [iUnion_subset_iff]
@[simp]
theorem subset_iInter_iff {s : Set α} {t : ι → Set α} : (s ⊆ ⋂ i, t i) ↔ ∀ i, s ⊆ t i :=
le_iInf_iff
theorem subset_iInter₂_iff {s : Set α} {t : ∀ i, κ i → Set α} :
(s ⊆ ⋂ (i) (j), t i j) ↔ ∀ i j, s ⊆ t i j := by simp_rw [subset_iInter_iff]
theorem subset_iUnion : ∀ (s : ι → Set β) (i : ι), s i ⊆ ⋃ i, s i :=
le_iSup
theorem iInter_subset : ∀ (s : ι → Set β) (i : ι), ⋂ i, s i ⊆ s i :=
iInf_le
lemma iInter_subset_iUnion [Nonempty ι] {s : ι → Set α} : ⋂ i, s i ⊆ ⋃ i, s i := iInf_le_iSup
theorem subset_iUnion₂ {s : ∀ i, κ i → Set α} (i : ι) (j : κ i) : s i j ⊆ ⋃ (i') (j'), s i' j' :=
le_iSup₂ i j
theorem iInter₂_subset {s : ∀ i, κ i → Set α} (i : ι) (j : κ i) : ⋂ (i) (j), s i j ⊆ s i j :=
iInf₂_le i j
/-- This rather trivial consequence of `subset_iUnion`is convenient with `apply`, and has `i`
explicit for this purpose. -/
theorem subset_iUnion_of_subset {s : Set α} {t : ι → Set α} (i : ι) (h : s ⊆ t i) : s ⊆ ⋃ i, t i :=
le_iSup_of_le i h
/-- This rather trivial consequence of `iInter_subset`is convenient with `apply`, and has `i`
explicit for this purpose. -/
theorem iInter_subset_of_subset {s : ι → Set α} {t : Set α} (i : ι) (h : s i ⊆ t) :
⋂ i, s i ⊆ t :=
iInf_le_of_le i h
/-- This rather trivial consequence of `subset_iUnion₂` is convenient with `apply`, and has `i` and
`j` explicit for this purpose. -/
theorem subset_iUnion₂_of_subset {s : Set α} {t : ∀ i, κ i → Set α} (i : ι) (j : κ i)
(h : s ⊆ t i j) : s ⊆ ⋃ (i) (j), t i j :=
le_iSup₂_of_le i j h
/-- This rather trivial consequence of `iInter₂_subset` is convenient with `apply`, and has `i` and
`j` explicit for this purpose. -/
theorem iInter₂_subset_of_subset {s : ∀ i, κ i → Set α} {t : Set α} (i : ι) (j : κ i)
(h : s i j ⊆ t) : ⋂ (i) (j), s i j ⊆ t :=
iInf₂_le_of_le i j h
theorem iUnion_mono {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : ⋃ i, s i ⊆ ⋃ i, t i :=
iSup_mono h
@[gcongr]
theorem iUnion_mono'' {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : iUnion s ⊆ iUnion t :=
iSup_mono h
theorem iUnion₂_mono {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j ⊆ t i j) :
⋃ (i) (j), s i j ⊆ ⋃ (i) (j), t i j :=
iSup₂_mono h
theorem iInter_mono {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : ⋂ i, s i ⊆ ⋂ i, t i :=
iInf_mono h
@[gcongr]
theorem iInter_mono'' {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : iInter s ⊆ iInter t :=
iInf_mono h
theorem iInter₂_mono {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j ⊆ t i j) :
⋂ (i) (j), s i j ⊆ ⋂ (i) (j), t i j :=
iInf₂_mono h
theorem iUnion_mono' {s : ι → Set α} {t : ι₂ → Set α} (h : ∀ i, ∃ j, s i ⊆ t j) :
⋃ i, s i ⊆ ⋃ i, t i :=
iSup_mono' h
theorem iUnion₂_mono' {s : ∀ i, κ i → Set α} {t : ∀ i', κ' i' → Set α}
(h : ∀ i j, ∃ i' j', s i j ⊆ t i' j') : ⋃ (i) (j), s i j ⊆ ⋃ (i') (j'), t i' j' :=
iSup₂_mono' h
theorem iInter_mono' {s : ι → Set α} {t : ι' → Set α} (h : ∀ j, ∃ i, s i ⊆ t j) :
⋂ i, s i ⊆ ⋂ j, t j :=
Set.subset_iInter fun j =>
let ⟨i, hi⟩ := h j
iInter_subset_of_subset i hi
theorem iInter₂_mono' {s : ∀ i, κ i → Set α} {t : ∀ i', κ' i' → Set α}
(h : ∀ i' j', ∃ i j, s i j ⊆ t i' j') : ⋂ (i) (j), s i j ⊆ ⋂ (i') (j'), t i' j' :=
subset_iInter₂_iff.2 fun i' j' =>
let ⟨_, _, hst⟩ := h i' j'
(iInter₂_subset _ _).trans hst
theorem iUnion₂_subset_iUnion (κ : ι → Sort*) (s : ι → Set α) :
⋃ (i) (_ : κ i), s i ⊆ ⋃ i, s i :=
iUnion_mono fun _ => iUnion_subset fun _ => Subset.rfl
theorem iInter_subset_iInter₂ (κ : ι → Sort*) (s : ι → Set α) :
⋂ i, s i ⊆ ⋂ (i) (_ : κ i), s i :=
iInter_mono fun _ => subset_iInter fun _ => Subset.rfl
theorem iUnion_setOf (P : ι → α → Prop) : ⋃ i, { x : α | P i x } = { x : α | ∃ i, P i x } := by
ext
exact mem_iUnion
theorem iInter_setOf (P : ι → α → Prop) : ⋂ i, { x : α | P i x } = { x : α | ∀ i, P i x } := by
ext
exact mem_iInter
theorem iUnion_congr_of_surjective {f : ι → Set α} {g : ι₂ → Set α} (h : ι → ι₂) (h1 : Surjective h)
(h2 : ∀ x, g (h x) = f x) : ⋃ x, f x = ⋃ y, g y :=
h1.iSup_congr h h2
theorem iInter_congr_of_surjective {f : ι → Set α} {g : ι₂ → Set α} (h : ι → ι₂) (h1 : Surjective h)
(h2 : ∀ x, g (h x) = f x) : ⋂ x, f x = ⋂ y, g y :=
h1.iInf_congr h h2
lemma iUnion_congr {s t : ι → Set α} (h : ∀ i, s i = t i) : ⋃ i, s i = ⋃ i, t i := iSup_congr h
lemma iInter_congr {s t : ι → Set α} (h : ∀ i, s i = t i) : ⋂ i, s i = ⋂ i, t i := iInf_congr h
lemma iUnion₂_congr {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j = t i j) :
⋃ (i) (j), s i j = ⋃ (i) (j), t i j :=
iUnion_congr fun i => iUnion_congr <| h i
lemma iInter₂_congr {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j = t i j) :
⋂ (i) (j), s i j = ⋂ (i) (j), t i j :=
iInter_congr fun i => iInter_congr <| h i
section Nonempty
variable [Nonempty ι] {f : ι → Set α} {s : Set α}
lemma iUnion_const (s : Set β) : ⋃ _ : ι, s = s := iSup_const
lemma iInter_const (s : Set β) : ⋂ _ : ι, s = s := iInf_const
lemma iUnion_eq_const (hf : ∀ i, f i = s) : ⋃ i, f i = s :=
(iUnion_congr hf).trans <| iUnion_const _
lemma iInter_eq_const (hf : ∀ i, f i = s) : ⋂ i, f i = s :=
(iInter_congr hf).trans <| iInter_const _
end Nonempty
@[simp]
theorem compl_iUnion (s : ι → Set β) : (⋃ i, s i)ᶜ = ⋂ i, (s i)ᶜ :=
compl_iSup
theorem compl_iUnion₂ (s : ∀ i, κ i → Set α) : (⋃ (i) (j), s i j)ᶜ = ⋂ (i) (j), (s i j)ᶜ := by
simp_rw [compl_iUnion]
@[simp]
theorem compl_iInter (s : ι → Set β) : (⋂ i, s i)ᶜ = ⋃ i, (s i)ᶜ :=
compl_iInf
theorem compl_iInter₂ (s : ∀ i, κ i → Set α) : (⋂ (i) (j), s i j)ᶜ = ⋃ (i) (j), (s i j)ᶜ := by
simp_rw [compl_iInter]
-- classical -- complete_boolean_algebra
theorem iUnion_eq_compl_iInter_compl (s : ι → Set β) : ⋃ i, s i = (⋂ i, (s i)ᶜ)ᶜ := by
simp only [compl_iInter, compl_compl]
-- classical -- complete_boolean_algebra
theorem iInter_eq_compl_iUnion_compl (s : ι → Set β) : ⋂ i, s i = (⋃ i, (s i)ᶜ)ᶜ := by
simp only [compl_iUnion, compl_compl]
theorem inter_iUnion (s : Set β) (t : ι → Set β) : (s ∩ ⋃ i, t i) = ⋃ i, s ∩ t i :=
inf_iSup_eq _ _
theorem iUnion_inter (s : Set β) (t : ι → Set β) : (⋃ i, t i) ∩ s = ⋃ i, t i ∩ s :=
iSup_inf_eq _ _
theorem iUnion_union_distrib (s : ι → Set β) (t : ι → Set β) :
⋃ i, s i ∪ t i = (⋃ i, s i) ∪ ⋃ i, t i :=
iSup_sup_eq
theorem iInter_inter_distrib (s : ι → Set β) (t : ι → Set β) :
⋂ i, s i ∩ t i = (⋂ i, s i) ∩ ⋂ i, t i :=
iInf_inf_eq
theorem union_iUnion [Nonempty ι] (s : Set β) (t : ι → Set β) : (s ∪ ⋃ i, t i) = ⋃ i, s ∪ t i :=
sup_iSup
theorem iUnion_union [Nonempty ι] (s : Set β) (t : ι → Set β) : (⋃ i, t i) ∪ s = ⋃ i, t i ∪ s :=
iSup_sup
theorem inter_iInter [Nonempty ι] (s : Set β) (t : ι → Set β) : (s ∩ ⋂ i, t i) = ⋂ i, s ∩ t i :=
inf_iInf
theorem iInter_inter [Nonempty ι] (s : Set β) (t : ι → Set β) : (⋂ i, t i) ∩ s = ⋂ i, t i ∩ s :=
iInf_inf
theorem insert_iUnion [Nonempty ι] (x : β) (t : ι → Set β) :
insert x (⋃ i, t i) = ⋃ i, insert x (t i) := by
simp_rw [← union_singleton, iUnion_union]
-- classical
theorem union_iInter (s : Set β) (t : ι → Set β) : (s ∪ ⋂ i, t i) = ⋂ i, s ∪ t i :=
sup_iInf_eq _ _
theorem iInter_union (s : ι → Set β) (t : Set β) : (⋂ i, s i) ∪ t = ⋂ i, s i ∪ t :=
iInf_sup_eq _ _
theorem insert_iInter (x : β) (t : ι → Set β) : insert x (⋂ i, t i) = ⋂ i, insert x (t i) := by
simp_rw [← union_singleton, iInter_union]
theorem iUnion_diff (s : Set β) (t : ι → Set β) : (⋃ i, t i) \ s = ⋃ i, t i \ s :=
iUnion_inter _ _
theorem diff_iUnion [Nonempty ι] (s : Set β) (t : ι → Set β) : (s \ ⋃ i, t i) = ⋂ i, s \ t i := by
rw [diff_eq, compl_iUnion, inter_iInter]; rfl
theorem diff_iInter (s : Set β) (t : ι → Set β) : (s \ ⋂ i, t i) = ⋃ i, s \ t i := by
rw [diff_eq, compl_iInter, inter_iUnion]; rfl
theorem iUnion_inter_subset {ι α} {s t : ι → Set α} : ⋃ i, s i ∩ t i ⊆ (⋃ i, s i) ∩ ⋃ i, t i :=
le_iSup_inf_iSup s t
theorem iUnion_inter_of_monotone {ι α} [Preorder ι] [IsDirected ι (· ≤ ·)] {s t : ι → Set α}
(hs : Monotone s) (ht : Monotone t) : ⋃ i, s i ∩ t i = (⋃ i, s i) ∩ ⋃ i, t i :=
iSup_inf_of_monotone hs ht
theorem iUnion_inter_of_antitone {ι α} [Preorder ι] [IsDirected ι (swap (· ≤ ·))] {s t : ι → Set α}
(hs : Antitone s) (ht : Antitone t) : ⋃ i, s i ∩ t i = (⋃ i, s i) ∩ ⋃ i, t i :=
iSup_inf_of_antitone hs ht
theorem iInter_union_of_monotone {ι α} [Preorder ι] [IsDirected ι (swap (· ≤ ·))] {s t : ι → Set α}
(hs : Monotone s) (ht : Monotone t) : ⋂ i, s i ∪ t i = (⋂ i, s i) ∪ ⋂ i, t i :=
iInf_sup_of_monotone hs ht
theorem iInter_union_of_antitone {ι α} [Preorder ι] [IsDirected ι (· ≤ ·)] {s t : ι → Set α}
(hs : Antitone s) (ht : Antitone t) : ⋂ i, s i ∪ t i = (⋂ i, s i) ∪ ⋂ i, t i :=
iInf_sup_of_antitone hs ht
/-- An equality version of this lemma is `iUnion_iInter_of_monotone` in `Data.Set.Finite`. -/
theorem iUnion_iInter_subset {s : ι → ι' → Set α} : (⋃ j, ⋂ i, s i j) ⊆ ⋂ i, ⋃ j, s i j :=
iSup_iInf_le_iInf_iSup (flip s)
theorem iUnion_option {ι} (s : Option ι → Set α) : ⋃ o, s o = s none ∪ ⋃ i, s (some i) :=
iSup_option s
theorem iInter_option {ι} (s : Option ι → Set α) : ⋂ o, s o = s none ∩ ⋂ i, s (some i) :=
iInf_option s
section
variable (p : ι → Prop) [DecidablePred p]
theorem iUnion_dite (f : ∀ i, p i → Set α) (g : ∀ i, ¬p i → Set α) :
⋃ i, (if h : p i then f i h else g i h) = (⋃ (i) (h : p i), f i h) ∪ ⋃ (i) (h : ¬p i), g i h :=
iSup_dite _ _ _
theorem iUnion_ite (f g : ι → Set α) :
⋃ i, (if p i then f i else g i) = (⋃ (i) (_ : p i), f i) ∪ ⋃ (i) (_ : ¬p i), g i :=
iUnion_dite _ _ _
theorem iInter_dite (f : ∀ i, p i → Set α) (g : ∀ i, ¬p i → Set α) :
⋂ i, (if h : p i then f i h else g i h) = (⋂ (i) (h : p i), f i h) ∩ ⋂ (i) (h : ¬p i), g i h :=
iInf_dite _ _ _
theorem iInter_ite (f g : ι → Set α) :
⋂ i, (if p i then f i else g i) = (⋂ (i) (_ : p i), f i) ∩ ⋂ (i) (_ : ¬p i), g i :=
iInter_dite _ _ _
end
/-! ### Unions and intersections indexed by `Prop` -/
theorem iInter_false {s : False → Set α} : iInter s = univ :=
iInf_false
theorem iUnion_false {s : False → Set α} : iUnion s = ∅ :=
iSup_false
@[simp]
theorem iInter_true {s : True → Set α} : iInter s = s trivial :=
iInf_true
@[simp]
theorem iUnion_true {s : True → Set α} : iUnion s = s trivial :=
iSup_true
@[simp]
theorem iInter_exists {p : ι → Prop} {f : Exists p → Set α} :
⋂ x, f x = ⋂ (i) (h : p i), f ⟨i, h⟩ :=
iInf_exists
@[simp]
theorem iUnion_exists {p : ι → Prop} {f : Exists p → Set α} :
⋃ x, f x = ⋃ (i) (h : p i), f ⟨i, h⟩ :=
iSup_exists
@[simp]
theorem iUnion_empty : (⋃ _ : ι, ∅ : Set α) = ∅ :=
iSup_bot
@[simp]
theorem iInter_univ : (⋂ _ : ι, univ : Set α) = univ :=
iInf_top
section
variable {s : ι → Set α}
@[simp]
theorem iUnion_eq_empty : ⋃ i, s i = ∅ ↔ ∀ i, s i = ∅ :=
iSup_eq_bot
@[simp]
theorem iInter_eq_univ : ⋂ i, s i = univ ↔ ∀ i, s i = univ :=
iInf_eq_top
@[simp]
theorem nonempty_iUnion : (⋃ i, s i).Nonempty ↔ ∃ i, (s i).Nonempty := by
simp [nonempty_iff_ne_empty]
theorem nonempty_biUnion {t : Set α} {s : α → Set β} :
(⋃ i ∈ t, s i).Nonempty ↔ ∃ i ∈ t, (s i).Nonempty := by simp
theorem iUnion_nonempty_index (s : Set α) (t : s.Nonempty → Set β) :
⋃ h, t h = ⋃ x ∈ s, t ⟨x, ‹_›⟩ :=
iSup_exists
end
@[simp]
theorem iInter_iInter_eq_left {b : β} {s : ∀ x : β, x = b → Set α} :
⋂ (x) (h : x = b), s x h = s b rfl :=
iInf_iInf_eq_left
@[simp]
theorem iInter_iInter_eq_right {b : β} {s : ∀ x : β, b = x → Set α} :
⋂ (x) (h : b = x), s x h = s b rfl :=
iInf_iInf_eq_right
@[simp]
theorem iUnion_iUnion_eq_left {b : β} {s : ∀ x : β, x = b → Set α} :
⋃ (x) (h : x = b), s x h = s b rfl :=
iSup_iSup_eq_left
@[simp]
theorem iUnion_iUnion_eq_right {b : β} {s : ∀ x : β, b = x → Set α} :
⋃ (x) (h : b = x), s x h = s b rfl :=
iSup_iSup_eq_right
theorem iInter_or {p q : Prop} (s : p ∨ q → Set α) :
⋂ h, s h = (⋂ h : p, s (Or.inl h)) ∩ ⋂ h : q, s (Or.inr h) :=
iInf_or
theorem iUnion_or {p q : Prop} (s : p ∨ q → Set α) :
⋃ h, s h = (⋃ i, s (Or.inl i)) ∪ ⋃ j, s (Or.inr j) :=
iSup_or
theorem iUnion_and {p q : Prop} (s : p ∧ q → Set α) : ⋃ h, s h = ⋃ (hp) (hq), s ⟨hp, hq⟩ :=
iSup_and
theorem iInter_and {p q : Prop} (s : p ∧ q → Set α) : ⋂ h, s h = ⋂ (hp) (hq), s ⟨hp, hq⟩ :=
iInf_and
theorem iUnion_comm (s : ι → ι' → Set α) : ⋃ (i) (i'), s i i' = ⋃ (i') (i), s i i' :=
iSup_comm
theorem iInter_comm (s : ι → ι' → Set α) : ⋂ (i) (i'), s i i' = ⋂ (i') (i), s i i' :=
iInf_comm
theorem iUnion_sigma {γ : α → Type*} (s : Sigma γ → Set β) : ⋃ ia, s ia = ⋃ i, ⋃ a, s ⟨i, a⟩ :=
iSup_sigma
theorem iUnion_sigma' {γ : α → Type*} (s : ∀ i, γ i → Set β) :
⋃ i, ⋃ a, s i a = ⋃ ia : Sigma γ, s ia.1 ia.2 :=
iSup_sigma' _
theorem iInter_sigma {γ : α → Type*} (s : Sigma γ → Set β) : ⋂ ia, s ia = ⋂ i, ⋂ a, s ⟨i, a⟩ :=
iInf_sigma
theorem iInter_sigma' {γ : α → Type*} (s : ∀ i, γ i → Set β) :
⋂ i, ⋂ a, s i a = ⋂ ia : Sigma γ, s ia.1 ia.2 :=
iInf_sigma' _
theorem iUnion₂_comm (s : ∀ i₁, κ₁ i₁ → ∀ i₂, κ₂ i₂ → Set α) :
⋃ (i₁) (j₁) (i₂) (j₂), s i₁ j₁ i₂ j₂ = ⋃ (i₂) (j₂) (i₁) (j₁), s i₁ j₁ i₂ j₂ :=
iSup₂_comm _
theorem iInter₂_comm (s : ∀ i₁, κ₁ i₁ → ∀ i₂, κ₂ i₂ → Set α) :
⋂ (i₁) (j₁) (i₂) (j₂), s i₁ j₁ i₂ j₂ = ⋂ (i₂) (j₂) (i₁) (j₁), s i₁ j₁ i₂ j₂ :=
iInf₂_comm _
@[simp]
theorem biUnion_and (p : ι → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p x ∧ q x y → Set α) :
⋃ (x : ι) (y : ι') (h : p x ∧ q x y), s x y h =
⋃ (x : ι) (hx : p x) (y : ι') (hy : q x y), s x y ⟨hx, hy⟩ := by
simp only [iUnion_and, @iUnion_comm _ ι']
@[simp]
theorem biUnion_and' (p : ι' → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p y ∧ q x y → Set α) :
⋃ (x : ι) (y : ι') (h : p y ∧ q x y), s x y h =
⋃ (y : ι') (hy : p y) (x : ι) (hx : q x y), s x y ⟨hy, hx⟩ := by
simp only [iUnion_and, @iUnion_comm _ ι]
@[simp]
theorem biInter_and (p : ι → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p x ∧ q x y → Set α) :
⋂ (x : ι) (y : ι') (h : p x ∧ q x y), s x y h =
⋂ (x : ι) (hx : p x) (y : ι') (hy : q x y), s x y ⟨hx, hy⟩ := by
simp only [iInter_and, @iInter_comm _ ι']
@[simp]
theorem biInter_and' (p : ι' → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p y ∧ q x y → Set α) :
⋂ (x : ι) (y : ι') (h : p y ∧ q x y), s x y h =
⋂ (y : ι') (hy : p y) (x : ι) (hx : q x y), s x y ⟨hy, hx⟩ := by
simp only [iInter_and, @iInter_comm _ ι]
@[simp]
theorem iUnion_iUnion_eq_or_left {b : β} {p : β → Prop} {s : ∀ x : β, x = b ∨ p x → Set α} :
⋃ (x) (h), s x h = s b (Or.inl rfl) ∪ ⋃ (x) (h : p x), s x (Or.inr h) := by
simp only [iUnion_or, iUnion_union_distrib, iUnion_iUnion_eq_left]
@[simp]
theorem iInter_iInter_eq_or_left {b : β} {p : β → Prop} {s : ∀ x : β, x = b ∨ p x → Set α} :
⋂ (x) (h), s x h = s b (Or.inl rfl) ∩ ⋂ (x) (h : p x), s x (Or.inr h) := by
simp only [iInter_or, iInter_inter_distrib, iInter_iInter_eq_left]
lemma iUnion_sum {s : α ⊕ β → Set γ} : ⋃ x, s x = (⋃ x, s (.inl x)) ∪ ⋃ x, s (.inr x) := iSup_sum
lemma iInter_sum {s : α ⊕ β → Set γ} : ⋂ x, s x = (⋂ x, s (.inl x)) ∩ ⋂ x, s (.inr x) := iInf_sum
theorem iUnion_psigma {γ : α → Type*} (s : PSigma γ → Set β) : ⋃ ia, s ia = ⋃ i, ⋃ a, s ⟨i, a⟩ :=
iSup_psigma _
/-- A reversed version of `iUnion_psigma` with a curried map. -/
theorem iUnion_psigma' {γ : α → Type*} (s : ∀ i, γ i → Set β) :
⋃ i, ⋃ a, s i a = ⋃ ia : PSigma γ, s ia.1 ia.2 :=
iSup_psigma' _
theorem iInter_psigma {γ : α → Type*} (s : PSigma γ → Set β) : ⋂ ia, s ia = ⋂ i, ⋂ a, s ⟨i, a⟩ :=
iInf_psigma _
/-- A reversed version of `iInter_psigma` with a curried map. -/
theorem iInter_psigma' {γ : α → Type*} (s : ∀ i, γ i → Set β) :
⋂ i, ⋂ a, s i a = ⋂ ia : PSigma γ, s ia.1 ia.2 :=
iInf_psigma' _
/-! ### Bounded unions and intersections -/
/-- A specialization of `mem_iUnion₂`. -/
theorem mem_biUnion {s : Set α} {t : α → Set β} {x : α} {y : β} (xs : x ∈ s) (ytx : y ∈ t x) :
y ∈ ⋃ x ∈ s, t x :=
mem_iUnion₂_of_mem xs ytx
/-- A specialization of `mem_iInter₂`. -/
theorem mem_biInter {s : Set α} {t : α → Set β} {y : β} (h : ∀ x ∈ s, y ∈ t x) :
y ∈ ⋂ x ∈ s, t x :=
mem_iInter₂_of_mem h
/-- A specialization of `subset_iUnion₂`. -/
theorem subset_biUnion_of_mem {s : Set α} {u : α → Set β} {x : α} (xs : x ∈ s) :
u x ⊆ ⋃ x ∈ s, u x :=
subset_iUnion₂ (s := fun i _ => u i) x xs
/-- A specialization of `iInter₂_subset`. -/
theorem biInter_subset_of_mem {s : Set α} {t : α → Set β} {x : α} (xs : x ∈ s) :
⋂ x ∈ s, t x ⊆ t x :=
iInter₂_subset x xs
lemma biInter_subset_biUnion {s : Set α} (hs : s.Nonempty) {t : α → Set β} :
⋂ x ∈ s, t x ⊆ ⋃ x ∈ s, t x := biInf_le_biSup hs
theorem biUnion_subset_biUnion_left {s s' : Set α} {t : α → Set β} (h : s ⊆ s') :
⋃ x ∈ s, t x ⊆ ⋃ x ∈ s', t x :=
iUnion₂_subset fun _ hx => subset_biUnion_of_mem <| h hx
theorem biInter_subset_biInter_left {s s' : Set α} {t : α → Set β} (h : s' ⊆ s) :
⋂ x ∈ s, t x ⊆ ⋂ x ∈ s', t x :=
subset_iInter₂ fun _ hx => biInter_subset_of_mem <| h hx
theorem biUnion_mono {s s' : Set α} {t t' : α → Set β} (hs : s' ⊆ s) (h : ∀ x ∈ s, t x ⊆ t' x) :
⋃ x ∈ s', t x ⊆ ⋃ x ∈ s, t' x :=
(biUnion_subset_biUnion_left hs).trans <| iUnion₂_mono h
theorem biInter_mono {s s' : Set α} {t t' : α → Set β} (hs : s ⊆ s') (h : ∀ x ∈ s, t x ⊆ t' x) :
⋂ x ∈ s', t x ⊆ ⋂ x ∈ s, t' x :=
(biInter_subset_biInter_left hs).trans <| iInter₂_mono h
theorem biUnion_eq_iUnion (s : Set α) (t : ∀ x ∈ s, Set β) :
⋃ x ∈ s, t x ‹_› = ⋃ x : s, t x x.2 :=
iSup_subtype'
theorem biInter_eq_iInter (s : Set α) (t : ∀ x ∈ s, Set β) :
⋂ x ∈ s, t x ‹_› = ⋂ x : s, t x x.2 :=
iInf_subtype'
@[simp] lemma biUnion_const {s : Set α} (hs : s.Nonempty) (t : Set β) : ⋃ a ∈ s, t = t :=
biSup_const hs
@[simp] lemma biInter_const {s : Set α} (hs : s.Nonempty) (t : Set β) : ⋂ a ∈ s, t = t :=
biInf_const hs
theorem iUnion_subtype (p : α → Prop) (s : { x // p x } → Set β) :
⋃ x : { x // p x }, s x = ⋃ (x) (hx : p x), s ⟨x, hx⟩ :=
iSup_subtype
theorem iInter_subtype (p : α → Prop) (s : { x // p x } → Set β) :
⋂ x : { x // p x }, s x = ⋂ (x) (hx : p x), s ⟨x, hx⟩ :=
iInf_subtype
theorem biInter_empty (u : α → Set β) : ⋂ x ∈ (∅ : Set α), u x = univ :=
iInf_emptyset
theorem biInter_univ (u : α → Set β) : ⋂ x ∈ @univ α, u x = ⋂ x, u x :=
iInf_univ
@[simp]
theorem biUnion_self (s : Set α) : ⋃ x ∈ s, s = s :=
Subset.antisymm (iUnion₂_subset fun _ _ => Subset.refl s) fun _ hx => mem_biUnion hx hx
@[simp]
theorem iUnion_nonempty_self (s : Set α) : ⋃ _ : s.Nonempty, s = s := by
rw [iUnion_nonempty_index, biUnion_self]
theorem biInter_singleton (a : α) (s : α → Set β) : ⋂ x ∈ ({a} : Set α), s x = s a :=
iInf_singleton
theorem biInter_union (s t : Set α) (u : α → Set β) :
⋂ x ∈ s ∪ t, u x = (⋂ x ∈ s, u x) ∩ ⋂ x ∈ t, u x :=
iInf_union
theorem biInter_insert (a : α) (s : Set α) (t : α → Set β) :
⋂ x ∈ insert a s, t x = t a ∩ ⋂ x ∈ s, t x := by simp
theorem biInter_pair (a b : α) (s : α → Set β) : ⋂ x ∈ ({a, b} : Set α), s x = s a ∩ s b := by
rw [biInter_insert, biInter_singleton]
theorem biInter_inter {ι α : Type*} {s : Set ι} (hs : s.Nonempty) (f : ι → Set α) (t : Set α) :
⋂ i ∈ s, f i ∩ t = (⋂ i ∈ s, f i) ∩ t := by
haveI : Nonempty s := hs.to_subtype
simp [biInter_eq_iInter, ← iInter_inter]
theorem inter_biInter {ι α : Type*} {s : Set ι} (hs : s.Nonempty) (f : ι → Set α) (t : Set α) :
⋂ i ∈ s, t ∩ f i = t ∩ ⋂ i ∈ s, f i := by
rw [inter_comm, ← biInter_inter hs]
simp [inter_comm]
theorem biUnion_empty (s : α → Set β) : ⋃ x ∈ (∅ : Set α), s x = ∅ :=
iSup_emptyset
theorem biUnion_univ (s : α → Set β) : ⋃ x ∈ @univ α, s x = ⋃ x, s x :=
iSup_univ
theorem biUnion_singleton (a : α) (s : α → Set β) : ⋃ x ∈ ({a} : Set α), s x = s a :=
iSup_singleton
@[simp]
theorem biUnion_of_singleton (s : Set α) : ⋃ x ∈ s, {x} = s :=
ext <| by simp
theorem biUnion_union (s t : Set α) (u : α → Set β) :
⋃ x ∈ s ∪ t, u x = (⋃ x ∈ s, u x) ∪ ⋃ x ∈ t, u x :=
iSup_union
@[simp]
theorem iUnion_coe_set {α β : Type*} (s : Set α) (f : s → Set β) :
⋃ i, f i = ⋃ i ∈ s, f ⟨i, ‹i ∈ s›⟩ :=
iUnion_subtype _ _
@[simp]
theorem iInter_coe_set {α β : Type*} (s : Set α) (f : s → Set β) :
⋂ i, f i = ⋂ i ∈ s, f ⟨i, ‹i ∈ s›⟩ :=
iInter_subtype _ _
theorem biUnion_insert (a : α) (s : Set α) (t : α → Set β) :
⋃ x ∈ insert a s, t x = t a ∪ ⋃ x ∈ s, t x := by simp
theorem biUnion_pair (a b : α) (s : α → Set β) : ⋃ x ∈ ({a, b} : Set α), s x = s a ∪ s b := by
simp
theorem inter_iUnion₂ (s : Set α) (t : ∀ i, κ i → Set α) :
(s ∩ ⋃ (i) (j), t i j) = ⋃ (i) (j), s ∩ t i j := by simp only [inter_iUnion]
theorem iUnion₂_inter (s : ∀ i, κ i → Set α) (t : Set α) :
(⋃ (i) (j), s i j) ∩ t = ⋃ (i) (j), s i j ∩ t := by simp_rw [iUnion_inter]
theorem union_iInter₂ (s : Set α) (t : ∀ i, κ i → Set α) :
(s ∪ ⋂ (i) (j), t i j) = ⋂ (i) (j), s ∪ t i j := by simp_rw [union_iInter]
theorem iInter₂_union (s : ∀ i, κ i → Set α) (t : Set α) :
(⋂ (i) (j), s i j) ∪ t = ⋂ (i) (j), s i j ∪ t := by simp_rw [iInter_union]
theorem mem_sUnion_of_mem {x : α} {t : Set α} {S : Set (Set α)} (hx : x ∈ t) (ht : t ∈ S) :
x ∈ ⋃₀ S :=
⟨t, ht, hx⟩
-- is this theorem really necessary?
theorem not_mem_of_not_mem_sUnion {x : α} {t : Set α} {S : Set (Set α)} (hx : x ∉ ⋃₀ S)
(ht : t ∈ S) : x ∉ t := fun h => hx ⟨t, ht, h⟩
theorem sInter_subset_of_mem {S : Set (Set α)} {t : Set α} (tS : t ∈ S) : ⋂₀ S ⊆ t :=
sInf_le tS
theorem subset_sUnion_of_mem {S : Set (Set α)} {t : Set α} (tS : t ∈ S) : t ⊆ ⋃₀ S :=
le_sSup tS
theorem subset_sUnion_of_subset {s : Set α} (t : Set (Set α)) (u : Set α) (h₁ : s ⊆ u)
(h₂ : u ∈ t) : s ⊆ ⋃₀ t :=
Subset.trans h₁ (subset_sUnion_of_mem h₂)
theorem sUnion_subset {S : Set (Set α)} {t : Set α} (h : ∀ t' ∈ S, t' ⊆ t) : ⋃₀ S ⊆ t :=
sSup_le h
@[simp]
theorem sUnion_subset_iff {s : Set (Set α)} {t : Set α} : ⋃₀ s ⊆ t ↔ ∀ t' ∈ s, t' ⊆ t :=
sSup_le_iff
/-- `sUnion` is monotone under taking a subset of each set. -/
lemma sUnion_mono_subsets {s : Set (Set α)} {f : Set α → Set α} (hf : ∀ t : Set α, t ⊆ f t) :
⋃₀ s ⊆ ⋃₀ (f '' s) :=
fun _ ⟨t, htx, hxt⟩ ↦ ⟨f t, mem_image_of_mem f htx, hf t hxt⟩
/-- `sUnion` is monotone under taking a superset of each set. -/
lemma sUnion_mono_supsets {s : Set (Set α)} {f : Set α → Set α} (hf : ∀ t : Set α, f t ⊆ t) :
⋃₀ (f '' s) ⊆ ⋃₀ s :=
-- If t ∈ f '' s is arbitrary; t = f u for some u : Set α.
fun _ ⟨_, ⟨u, hus, hut⟩, hxt⟩ ↦ ⟨u, hus, (hut ▸ hf u) hxt⟩
theorem subset_sInter {S : Set (Set α)} {t : Set α} (h : ∀ t' ∈ S, t ⊆ t') : t ⊆ ⋂₀ S :=
le_sInf h
@[simp]
theorem subset_sInter_iff {S : Set (Set α)} {t : Set α} : t ⊆ ⋂₀ S ↔ ∀ t' ∈ S, t ⊆ t' :=
le_sInf_iff
@[gcongr]
theorem sUnion_subset_sUnion {S T : Set (Set α)} (h : S ⊆ T) : ⋃₀ S ⊆ ⋃₀ T :=
sUnion_subset fun _ hs => subset_sUnion_of_mem (h hs)
@[gcongr]
theorem sInter_subset_sInter {S T : Set (Set α)} (h : S ⊆ T) : ⋂₀ T ⊆ ⋂₀ S :=
subset_sInter fun _ hs => sInter_subset_of_mem (h hs)
@[simp]
theorem sUnion_empty : ⋃₀ ∅ = (∅ : Set α) :=
sSup_empty
@[simp]
theorem sInter_empty : ⋂₀ ∅ = (univ : Set α) :=
sInf_empty
@[simp]
theorem sUnion_singleton (s : Set α) : ⋃₀ {s} = s :=
sSup_singleton
@[simp]
theorem sInter_singleton (s : Set α) : ⋂₀ {s} = s :=
sInf_singleton
@[simp]
theorem sUnion_eq_empty {S : Set (Set α)} : ⋃₀ S = ∅ ↔ ∀ s ∈ S, s = ∅ :=
sSup_eq_bot
@[simp]
theorem sInter_eq_univ {S : Set (Set α)} : ⋂₀ S = univ ↔ ∀ s ∈ S, s = univ :=
sInf_eq_top
theorem subset_powerset_iff {s : Set (Set α)} {t : Set α} : s ⊆ 𝒫 t ↔ ⋃₀ s ⊆ t :=
sUnion_subset_iff.symm
/-- `⋃₀` and `𝒫` form a Galois connection. -/
theorem sUnion_powerset_gc :
GaloisConnection (⋃₀ · : Set (Set α) → Set α) (𝒫 · : Set α → Set (Set α)) :=
gc_sSup_Iic
/-- `⋃₀` and `𝒫` form a Galois insertion. -/
def sUnionPowersetGI :
GaloisInsertion (⋃₀ · : Set (Set α) → Set α) (𝒫 · : Set α → Set (Set α)) :=
gi_sSup_Iic
@[deprecated (since := "2024-12-07")] alias sUnion_powerset_gi := sUnionPowersetGI
/-- If all sets in a collection are either `∅` or `Set.univ`, then so is their union. -/
theorem sUnion_mem_empty_univ {S : Set (Set α)} (h : S ⊆ {∅, univ}) :
⋃₀ S ∈ ({∅, univ} : Set (Set α)) := by
simp only [mem_insert_iff, mem_singleton_iff, or_iff_not_imp_left, sUnion_eq_empty, not_forall]
rintro ⟨s, hs, hne⟩
obtain rfl : s = univ := (h hs).resolve_left hne
exact univ_subset_iff.1 <| subset_sUnion_of_mem hs
@[simp]
theorem nonempty_sUnion {S : Set (Set α)} : (⋃₀ S).Nonempty ↔ ∃ s ∈ S, Set.Nonempty s := by
simp [nonempty_iff_ne_empty]
theorem Nonempty.of_sUnion {s : Set (Set α)} (h : (⋃₀ s).Nonempty) : s.Nonempty :=
let ⟨s, hs, _⟩ := nonempty_sUnion.1 h
⟨s, hs⟩
theorem Nonempty.of_sUnion_eq_univ [Nonempty α] {s : Set (Set α)} (h : ⋃₀ s = univ) : s.Nonempty :=
Nonempty.of_sUnion <| h.symm ▸ univ_nonempty
theorem sUnion_union (S T : Set (Set α)) : ⋃₀ (S ∪ T) = ⋃₀ S ∪ ⋃₀ T :=
sSup_union
theorem sInter_union (S T : Set (Set α)) : ⋂₀ (S ∪ T) = ⋂₀ S ∩ ⋂₀ T :=
sInf_union
@[simp]
theorem sUnion_insert (s : Set α) (T : Set (Set α)) : ⋃₀ insert s T = s ∪ ⋃₀ T :=
sSup_insert
@[simp]
theorem sInter_insert (s : Set α) (T : Set (Set α)) : ⋂₀ insert s T = s ∩ ⋂₀ T :=
sInf_insert
@[simp]
theorem sUnion_diff_singleton_empty (s : Set (Set α)) : ⋃₀ (s \ {∅}) = ⋃₀ s :=
sSup_diff_singleton_bot s
@[simp]
theorem sInter_diff_singleton_univ (s : Set (Set α)) : ⋂₀ (s \ {univ}) = ⋂₀ s :=
sInf_diff_singleton_top s
theorem sUnion_pair (s t : Set α) : ⋃₀ {s, t} = s ∪ t :=
sSup_pair
theorem sInter_pair (s t : Set α) : ⋂₀ {s, t} = s ∩ t :=
sInf_pair
@[simp]
theorem sUnion_image (f : α → Set β) (s : Set α) : ⋃₀ (f '' s) = ⋃ a ∈ s, f a :=
sSup_image
@[simp]
theorem sInter_image (f : α → Set β) (s : Set α) : ⋂₀ (f '' s) = ⋂ a ∈ s, f a :=
sInf_image
@[simp]
lemma sUnion_image2 (f : α → β → Set γ) (s : Set α) (t : Set β) :
⋃₀ (image2 f s t) = ⋃ (a ∈ s) (b ∈ t), f a b := sSup_image2
@[simp]
lemma sInter_image2 (f : α → β → Set γ) (s : Set α) (t : Set β) :
⋂₀ (image2 f s t) = ⋂ (a ∈ s) (b ∈ t), f a b := sInf_image2
@[simp]
theorem sUnion_range (f : ι → Set β) : ⋃₀ range f = ⋃ x, f x :=
rfl
@[simp]
theorem sInter_range (f : ι → Set β) : ⋂₀ range f = ⋂ x, f x :=
rfl
theorem iUnion_eq_univ_iff {f : ι → Set α} : ⋃ i, f i = univ ↔ ∀ x, ∃ i, x ∈ f i := by
simp only [eq_univ_iff_forall, mem_iUnion]
theorem iUnion₂_eq_univ_iff {s : ∀ i, κ i → Set α} :
⋃ (i) (j), s i j = univ ↔ ∀ a, ∃ i j, a ∈ s i j := by
simp only [iUnion_eq_univ_iff, mem_iUnion]
theorem sUnion_eq_univ_iff {c : Set (Set α)} : ⋃₀ c = univ ↔ ∀ a, ∃ b ∈ c, a ∈ b := by
simp only [eq_univ_iff_forall, mem_sUnion]
-- classical
theorem iInter_eq_empty_iff {f : ι → Set α} : ⋂ i, f i = ∅ ↔ ∀ x, ∃ i, x ∉ f i := by
simp [Set.eq_empty_iff_forall_not_mem]
-- classical
theorem iInter₂_eq_empty_iff {s : ∀ i, κ i → Set α} :
⋂ (i) (j), s i j = ∅ ↔ ∀ a, ∃ i j, a ∉ s i j := by
simp only [eq_empty_iff_forall_not_mem, mem_iInter, not_forall]
-- classical
theorem sInter_eq_empty_iff {c : Set (Set α)} : ⋂₀ c = ∅ ↔ ∀ a, ∃ b ∈ c, a ∉ b := by
simp [Set.eq_empty_iff_forall_not_mem]
-- classical
@[simp]
theorem nonempty_iInter {f : ι → Set α} : (⋂ i, f i).Nonempty ↔ ∃ x, ∀ i, x ∈ f i := by
simp [nonempty_iff_ne_empty, iInter_eq_empty_iff]
-- classical
theorem nonempty_iInter₂ {s : ∀ i, κ i → Set α} :
(⋂ (i) (j), s i j).Nonempty ↔ ∃ a, ∀ i j, a ∈ s i j := by
simp
-- classical
@[simp]
theorem nonempty_sInter {c : Set (Set α)} : (⋂₀ c).Nonempty ↔ ∃ a, ∀ b ∈ c, a ∈ b := by
simp [nonempty_iff_ne_empty, sInter_eq_empty_iff]
-- classical
theorem compl_sUnion (S : Set (Set α)) : (⋃₀ S)ᶜ = ⋂₀ (compl '' S) :=
ext fun x => by simp
-- classical
theorem sUnion_eq_compl_sInter_compl (S : Set (Set α)) : ⋃₀ S = (⋂₀ (compl '' S))ᶜ := by
rw [← compl_compl (⋃₀ S), compl_sUnion]
-- classical
theorem compl_sInter (S : Set (Set α)) : (⋂₀ S)ᶜ = ⋃₀ (compl '' S) := by
rw [sUnion_eq_compl_sInter_compl, compl_compl_image]
-- classical
theorem sInter_eq_compl_sUnion_compl (S : Set (Set α)) : ⋂₀ S = (⋃₀ (compl '' S))ᶜ := by
rw [← compl_compl (⋂₀ S), compl_sInter]
theorem inter_empty_of_inter_sUnion_empty {s t : Set α} {S : Set (Set α)} (hs : t ∈ S)
(h : s ∩ ⋃₀ S = ∅) : s ∩ t = ∅ :=
eq_empty_of_subset_empty <| by
rw [← h]; exact inter_subset_inter_right _ (subset_sUnion_of_mem hs)
theorem range_sigma_eq_iUnion_range {γ : α → Type*} (f : Sigma γ → β) :
range f = ⋃ a, range fun b => f ⟨a, b⟩ :=
Set.ext <| by simp
theorem iUnion_eq_range_sigma (s : α → Set β) : ⋃ i, s i = range fun a : Σi, s i => a.2 := by
simp [Set.ext_iff]
theorem iUnion_eq_range_psigma (s : ι → Set β) : ⋃ i, s i = range fun a : Σ'i, s i => a.2 := by
simp [Set.ext_iff]
theorem iUnion_image_preimage_sigma_mk_eq_self {ι : Type*} {σ : ι → Type*} (s : Set (Sigma σ)) :
⋃ i, Sigma.mk i '' (Sigma.mk i ⁻¹' s) = s := by
ext x
simp only [mem_iUnion, mem_image, mem_preimage]
constructor
· rintro ⟨i, a, h, rfl⟩
exact h
· intro h
obtain ⟨i, a⟩ := x
exact ⟨i, a, h, rfl⟩
theorem Sigma.univ (X : α → Type*) : (Set.univ : Set (Σa, X a)) = ⋃ a, range (Sigma.mk a) :=
Set.ext fun x =>
iff_of_true trivial ⟨range (Sigma.mk x.1), Set.mem_range_self _, x.2, Sigma.eta x⟩
alias sUnion_mono := sUnion_subset_sUnion
alias sInter_mono := sInter_subset_sInter
theorem iUnion_subset_iUnion_const {s : Set α} (h : ι → ι₂) : ⋃ _ : ι, s ⊆ ⋃ _ : ι₂, s :=
iSup_const_mono (α := Set α) h
@[simp]
theorem iUnion_singleton_eq_range (f : α → β) : ⋃ x : α, {f x} = range f := by
ext x
simp [@eq_comm _ x]
theorem iUnion_insert_eq_range_union_iUnion {ι : Type*} (x : ι → β) (t : ι → Set β) :
⋃ i, insert (x i) (t i) = range x ∪ ⋃ i, t i := by
simp_rw [← union_singleton, iUnion_union_distrib, union_comm, iUnion_singleton_eq_range]
theorem iUnion_of_singleton (α : Type*) : (⋃ x, {x} : Set α) = univ := by simp [Set.ext_iff]
theorem iUnion_of_singleton_coe (s : Set α) : ⋃ i : s, ({(i : α)} : Set α) = s := by simp
theorem sUnion_eq_biUnion {s : Set (Set α)} : ⋃₀ s = ⋃ (i : Set α) (_ : i ∈ s), i := by
rw [← sUnion_image, image_id']
theorem sInter_eq_biInter {s : Set (Set α)} : ⋂₀ s = ⋂ (i : Set α) (_ : i ∈ s), i := by
rw [← sInter_image, image_id']
theorem sUnion_eq_iUnion {s : Set (Set α)} : ⋃₀ s = ⋃ i : s, i := by
simp only [← sUnion_range, Subtype.range_coe]
theorem sInter_eq_iInter {s : Set (Set α)} : ⋂₀ s = ⋂ i : s, i := by
simp only [← sInter_range, Subtype.range_coe]
@[simp]
theorem iUnion_of_empty [IsEmpty ι] (s : ι → Set α) : ⋃ i, s i = ∅ :=
iSup_of_empty _
@[simp]
theorem iInter_of_empty [IsEmpty ι] (s : ι → Set α) : ⋂ i, s i = univ :=
iInf_of_empty _
theorem union_eq_iUnion {s₁ s₂ : Set α} : s₁ ∪ s₂ = ⋃ b : Bool, cond b s₁ s₂ :=
sup_eq_iSup s₁ s₂
theorem inter_eq_iInter {s₁ s₂ : Set α} : s₁ ∩ s₂ = ⋂ b : Bool, cond b s₁ s₂ :=
inf_eq_iInf s₁ s₂
theorem sInter_union_sInter {S T : Set (Set α)} :
⋂₀ S ∪ ⋂₀ T = ⋂ p ∈ S ×ˢ T, (p : Set α × Set α).1 ∪ p.2 :=
sInf_sup_sInf
theorem sUnion_inter_sUnion {s t : Set (Set α)} :
⋃₀ s ∩ ⋃₀ t = ⋃ p ∈ s ×ˢ t, (p : Set α × Set α).1 ∩ p.2 :=
sSup_inf_sSup
theorem biUnion_iUnion (s : ι → Set α) (t : α → Set β) :
⋃ x ∈ ⋃ i, s i, t x = ⋃ (i) (x ∈ s i), t x := by simp [@iUnion_comm _ ι]
theorem biInter_iUnion (s : ι → Set α) (t : α → Set β) :
⋂ x ∈ ⋃ i, s i, t x = ⋂ (i) (x ∈ s i), t x := by simp [@iInter_comm _ ι]
theorem sUnion_iUnion (s : ι → Set (Set α)) : ⋃₀ ⋃ i, s i = ⋃ i, ⋃₀ s i := by
simp only [sUnion_eq_biUnion, biUnion_iUnion]
theorem sInter_iUnion (s : ι → Set (Set α)) : ⋂₀ ⋃ i, s i = ⋂ i, ⋂₀ s i := by
simp only [sInter_eq_biInter, biInter_iUnion]
theorem iUnion_range_eq_sUnion {α β : Type*} (C : Set (Set α)) {f : ∀ s : C, β → (s : Type _)}
(hf : ∀ s : C, Surjective (f s)) : ⋃ y : β, range (fun s : C => (f s y).val) = ⋃₀ C := by
ext x; constructor
· rintro ⟨s, ⟨y, rfl⟩, ⟨s, hs⟩, rfl⟩
refine ⟨_, hs, ?_⟩
exact (f ⟨s, hs⟩ y).2
· rintro ⟨s, hs, hx⟩
obtain ⟨y, hy⟩ := hf ⟨s, hs⟩ ⟨x, hx⟩
refine ⟨_, ⟨y, rfl⟩, ⟨s, hs⟩, ?_⟩
exact congr_arg Subtype.val hy
theorem iUnion_range_eq_iUnion (C : ι → Set α) {f : ∀ x : ι, β → C x}
(hf : ∀ x : ι, Surjective (f x)) : ⋃ y : β, range (fun x : ι => (f x y).val) = ⋃ x, C x := by
ext x; rw [mem_iUnion, mem_iUnion]; constructor
· rintro ⟨y, i, rfl⟩
exact ⟨i, (f i y).2⟩
· rintro ⟨i, hx⟩
obtain ⟨y, hy⟩ := hf i ⟨x, hx⟩
exact ⟨y, i, congr_arg Subtype.val hy⟩
theorem union_distrib_iInter_left (s : ι → Set α) (t : Set α) : (t ∪ ⋂ i, s i) = ⋂ i, t ∪ s i :=
sup_iInf_eq _ _
theorem union_distrib_iInter₂_left (s : Set α) (t : ∀ i, κ i → Set α) :
(s ∪ ⋂ (i) (j), t i j) = ⋂ (i) (j), s ∪ t i j := by simp_rw [union_distrib_iInter_left]
theorem union_distrib_iInter_right (s : ι → Set α) (t : Set α) : (⋂ i, s i) ∪ t = ⋂ i, s i ∪ t :=
iInf_sup_eq _ _
theorem union_distrib_iInter₂_right (s : ∀ i, κ i → Set α) (t : Set α) :
(⋂ (i) (j), s i j) ∪ t = ⋂ (i) (j), s i j ∪ t := by simp_rw [union_distrib_iInter_right]
lemma biUnion_lt_eq_iUnion [LT α] [NoMaxOrder α] {s : α → Set β} :
⋃ (n) (m < n), s m = ⋃ n, s n := biSup_lt_eq_iSup
lemma biUnion_le_eq_iUnion [Preorder α] {s : α → Set β} :
⋃ (n) (m ≤ n), s m = ⋃ n, s n := biSup_le_eq_iSup
lemma biInter_lt_eq_iInter [LT α] [NoMaxOrder α] {s : α → Set β} :
⋂ (n) (m < n), s m = ⋂ (n), s n := biInf_lt_eq_iInf
lemma biInter_le_eq_iInter [Preorder α] {s : α → Set β} :
⋂ (n) (m ≤ n), s m = ⋂ (n), s n := biInf_le_eq_iInf
lemma biUnion_gt_eq_iUnion [LT α] [NoMinOrder α] {s : α → Set β} :
⋃ (n) (m > n), s m = ⋃ n, s n := biSup_gt_eq_iSup
lemma biUnion_ge_eq_iUnion [Preorder α] {s : α → Set β} :
⋃ (n) (m ≥ n), s m = ⋃ n, s n := biSup_ge_eq_iSup
lemma biInter_gt_eq_iInf [LT α] [NoMinOrder α] {s : α → Set β} :
⋂ (n) (m > n), s m = ⋂ n, s n := biInf_gt_eq_iInf
lemma biInter_ge_eq_iInf [Preorder α] {s : α → Set β} :
⋂ (n) (m ≥ n), s m = ⋂ n, s n := biInf_ge_eq_iInf
section le
variable {ι : Type*} [PartialOrder ι] (s : ι → Set α) (i : ι)
theorem biUnion_le : (⋃ j ≤ i, s j) = (⋃ j < i, s j) ∪ s i :=
biSup_le_eq_sup s i
theorem biInter_le : (⋂ j ≤ i, s j) = (⋂ j < i, s j) ∩ s i :=
biInf_le_eq_inf s i
theorem biUnion_ge : (⋃ j ≥ i, s j) = s i ∪ ⋃ j > i, s j :=
biSup_ge_eq_sup s i
theorem biInter_ge : (⋂ j ≥ i, s j) = s i ∩ ⋂ j > i, s j :=
biInf_ge_eq_inf s i
end le
section Pi
variable {π : α → Type*}
theorem pi_def (i : Set α) (s : ∀ a, Set (π a)) : pi i s = ⋂ a ∈ i, eval a ⁻¹' s a := by
ext
simp
theorem univ_pi_eq_iInter (t : ∀ i, Set (π i)) : pi univ t = ⋂ i, eval i ⁻¹' t i := by
simp only [pi_def, iInter_true, mem_univ]
theorem pi_diff_pi_subset (i : Set α) (s t : ∀ a, Set (π a)) :
pi i s \ pi i t ⊆ ⋃ a ∈ i, eval a ⁻¹' (s a \ t a) := by
refine diff_subset_comm.2 fun x hx a ha => ?_
simp only [mem_diff, mem_pi, mem_iUnion, not_exists, mem_preimage, not_and, not_not,
eval_apply] at hx
exact hx.2 _ ha (hx.1 _ ha)
theorem iUnion_univ_pi {ι : α → Type*} (t : (a : α) → ι a → Set (π a)) :
⋃ x : (a : α) → ι a, pi univ (fun a => t a (x a)) = pi univ fun a => ⋃ j : ι a, t a j := by
ext
simp [Classical.skolem]
end Pi
section Directed
theorem directedOn_iUnion {r} {f : ι → Set α} (hd : Directed (· ⊆ ·) f)
(h : ∀ x, DirectedOn r (f x)) : DirectedOn r (⋃ x, f x) := by
simp only [DirectedOn, exists_prop, mem_iUnion, exists_imp]
exact fun a₁ b₁ fb₁ a₂ b₂ fb₂ =>
let ⟨z, zb₁, zb₂⟩ := hd b₁ b₂
let ⟨x, xf, xa₁, xa₂⟩ := h z a₁ (zb₁ fb₁) a₂ (zb₂ fb₂)
⟨x, ⟨z, xf⟩, xa₁, xa₂⟩
theorem directedOn_sUnion {r} {S : Set (Set α)} (hd : DirectedOn (· ⊆ ·) S)
(h : ∀ x ∈ S, DirectedOn r x) : DirectedOn r (⋃₀ S) := by
rw [sUnion_eq_iUnion]
exact directedOn_iUnion (directedOn_iff_directed.mp hd) (fun i ↦ h i.1 i.2)
theorem pairwise_iUnion₂ {S : Set (Set α)} (hd : DirectedOn (· ⊆ ·) S)
(r : α → α → Prop) (h : ∀ s ∈ S, s.Pairwise r) : (⋃ s ∈ S, s).Pairwise r := by
simp only [Set.Pairwise, Set.mem_iUnion, exists_prop, forall_exists_index, and_imp]
intro x S hS hx y T hT hy hne
obtain ⟨U, hU, hSU, hTU⟩ := hd S hS T hT
exact h U hU (hSU hx) (hTU hy) hne
end Directed
end Set
namespace Function
namespace Surjective
theorem iUnion_comp {f : ι → ι₂} (hf : Surjective f) (g : ι₂ → Set α) : ⋃ x, g (f x) = ⋃ y, g y :=
hf.iSup_comp g
theorem iInter_comp {f : ι → ι₂} (hf : Surjective f) (g : ι₂ → Set α) : ⋂ x, g (f x) = ⋂ y, g y :=
hf.iInf_comp g
end Surjective
end Function
/-!
### Disjoint sets
-/
section Disjoint
variable {s t : Set α}
namespace Set
@[simp]
theorem disjoint_iUnion_left {ι : Sort*} {s : ι → Set α} :
Disjoint (⋃ i, s i) t ↔ ∀ i, Disjoint (s i) t :=
iSup_disjoint_iff
@[simp]
theorem disjoint_iUnion_right {ι : Sort*} {s : ι → Set α} :
Disjoint t (⋃ i, s i) ↔ ∀ i, Disjoint t (s i) :=
disjoint_iSup_iff
theorem disjoint_iUnion₂_left {s : ∀ i, κ i → Set α} {t : Set α} :
Disjoint (⋃ (i) (j), s i j) t ↔ ∀ i j, Disjoint (s i j) t :=
iSup₂_disjoint_iff
theorem disjoint_iUnion₂_right {s : Set α} {t : ∀ i, κ i → Set α} :
Disjoint s (⋃ (i) (j), t i j) ↔ ∀ i j, Disjoint s (t i j) :=
disjoint_iSup₂_iff
@[simp]
theorem disjoint_sUnion_left {S : Set (Set α)} {t : Set α} :
Disjoint (⋃₀ S) t ↔ ∀ s ∈ S, Disjoint s t :=
sSup_disjoint_iff
@[simp]
theorem disjoint_sUnion_right {s : Set α} {S : Set (Set α)} :
Disjoint s (⋃₀ S) ↔ ∀ t ∈ S, Disjoint s t :=
disjoint_sSup_iff
lemma biUnion_compl_eq_of_pairwise_disjoint_of_iUnion_eq_univ {ι : Type*} {Es : ι → Set α}
(Es_union : ⋃ i, Es i = univ) (Es_disj : Pairwise fun i j ↦ Disjoint (Es i) (Es j))
(I : Set ι) :
(⋃ i ∈ I, Es i)ᶜ = ⋃ i ∈ Iᶜ, Es i := by
ext x
obtain ⟨i, hix⟩ : ∃ i, x ∈ Es i := by simp [← mem_iUnion, Es_union]
have obs : ∀ (J : Set ι), x ∈ ⋃ j ∈ J, Es j ↔ i ∈ J := by
refine fun J ↦ ⟨?_, fun i_in_J ↦ by simpa only [mem_iUnion, exists_prop] using ⟨i, i_in_J, hix⟩⟩
intro x_in_U
simp only [mem_iUnion, exists_prop] at x_in_U
obtain ⟨j, j_in_J, hjx⟩ := x_in_U
rwa [show i = j by by_contra i_ne_j; exact Disjoint.ne_of_mem (Es_disj i_ne_j) hix hjx rfl]
have obs' : ∀ (J : Set ι), x ∈ (⋃ j ∈ J, Es j)ᶜ ↔ i ∉ J :=
fun J ↦ by simpa only [mem_compl_iff, not_iff_not] using obs J
rw [obs, obs', mem_compl_iff]
end Set
end Disjoint
/-! ### Intervals -/
namespace Set
lemma nonempty_iInter_Iic_iff [Preorder α] {f : ι → α} :
(⋂ i, Iic (f i)).Nonempty ↔ BddBelow (range f) := by
have : (⋂ (i : ι), Iic (f i)) = lowerBounds (range f) := by
ext c; simp [lowerBounds]
simp [this, BddBelow]
lemma nonempty_iInter_Ici_iff [Preorder α] {f : ι → α} :
(⋂ i, Ici (f i)).Nonempty ↔ BddAbove (range f) :=
nonempty_iInter_Iic_iff (α := αᵒᵈ)
variable [CompleteLattice α]
theorem Ici_iSup (f : ι → α) : Ici (⨆ i, f i) = ⋂ i, Ici (f i) :=
ext fun _ => by simp only [mem_Ici, iSup_le_iff, mem_iInter]
theorem Iic_iInf (f : ι → α) : Iic (⨅ i, f i) = ⋂ i, Iic (f i) :=
ext fun _ => by simp only [mem_Iic, le_iInf_iff, mem_iInter]
theorem Ici_iSup₂ (f : ∀ i, κ i → α) : Ici (⨆ (i) (j), f i j) = ⋂ (i) (j), Ici (f i j) := by
simp_rw [Ici_iSup]
theorem Iic_iInf₂ (f : ∀ i, κ i → α) : Iic (⨅ (i) (j), f i j) = ⋂ (i) (j), Iic (f i j) := by
simp_rw [Iic_iInf]
theorem Ici_sSup (s : Set α) : Ici (sSup s) = ⋂ a ∈ s, Ici a := by rw [sSup_eq_iSup, Ici_iSup₂]
theorem Iic_sInf (s : Set α) : Iic (sInf s) = ⋂ a ∈ s, Iic a := by rw [sInf_eq_iInf, Iic_iInf₂]
end Set
namespace Set
variable (t : α → Set β)
theorem biUnion_diff_biUnion_subset (s₁ s₂ : Set α) :
((⋃ x ∈ s₁, t x) \ ⋃ x ∈ s₂, t x) ⊆ ⋃ x ∈ s₁ \ s₂, t x := by
simp only [diff_subset_iff, ← biUnion_union]
apply biUnion_subset_biUnion_left
rw [union_diff_self]
apply subset_union_right
/-- If `t` is an indexed family of sets, then there is a natural map from `Σ i, t i` to `⋃ i, t i`
sending `⟨i, x⟩` to `x`. -/
def sigmaToiUnion (x : Σi, t i) : ⋃ i, t i :=
⟨x.2, mem_iUnion.2 ⟨x.1, x.2.2⟩⟩
theorem sigmaToiUnion_surjective : Surjective (sigmaToiUnion t)
| ⟨b, hb⟩ =>
have : ∃ a, b ∈ t a := by simpa using hb
let ⟨a, hb⟩ := this
⟨⟨a, b, hb⟩, rfl⟩
theorem sigmaToiUnion_injective (h : Pairwise (Disjoint on t)) :
Injective (sigmaToiUnion t)
| ⟨a₁, b₁, h₁⟩, ⟨a₂, b₂, h₂⟩, eq =>
have b_eq : b₁ = b₂ := congr_arg Subtype.val eq
have a_eq : a₁ = a₂ :=
by_contradiction fun ne =>
have : b₁ ∈ t a₁ ∩ t a₂ := ⟨h₁, b_eq.symm ▸ h₂⟩
(h ne).le_bot this
Sigma.eq a_eq <| Subtype.eq <| by subst b_eq; subst a_eq; rfl
theorem sigmaToiUnion_bijective (h : Pairwise (Disjoint on t)) :
Bijective (sigmaToiUnion t) :=
⟨sigmaToiUnion_injective t h, sigmaToiUnion_surjective t⟩
/-- Equivalence from the disjoint union of a family of sets forming a partition of `β`, to `β`
itself. -/
noncomputable def sigmaEquiv (s : α → Set β) (hs : ∀ b, ∃! i, b ∈ s i) :
(Σ i, s i) ≃ β where
toFun | ⟨_, b⟩ => b
invFun b := ⟨(hs b).choose, b, (hs b).choose_spec.1⟩
left_inv | ⟨i, b, hb⟩ => Sigma.subtype_ext ((hs b).choose_spec.2 i hb).symm rfl
right_inv _ := rfl
/-- Equivalence between a disjoint union and a dependent sum. -/
noncomputable def unionEqSigmaOfDisjoint {t : α → Set β}
(h : Pairwise (Disjoint on t)) :
(⋃ i, t i) ≃ Σi, t i :=
(Equiv.ofBijective _ <| sigmaToiUnion_bijective t h).symm
theorem iUnion_ge_eq_iUnion_nat_add (u : ℕ → Set α) (n : ℕ) : ⋃ i ≥ n, u i = ⋃ i, u (i + n) :=
iSup_ge_eq_iSup_nat_add u n
theorem iInter_ge_eq_iInter_nat_add (u : ℕ → Set α) (n : ℕ) : ⋂ i ≥ n, u i = ⋂ i, u (i + n) :=
iInf_ge_eq_iInf_nat_add u n
theorem _root_.Monotone.iUnion_nat_add {f : ℕ → Set α} (hf : Monotone f) (k : ℕ) :
⋃ n, f (n + k) = ⋃ n, f n :=
hf.iSup_nat_add k
theorem _root_.Antitone.iInter_nat_add {f : ℕ → Set α} (hf : Antitone f) (k : ℕ) :
⋂ n, f (n + k) = ⋂ n, f n :=
hf.iInf_nat_add k
@[simp]
theorem iUnion_iInter_ge_nat_add (f : ℕ → Set α) (k : ℕ) :
⋃ n, ⋂ i ≥ n, f (i + k) = ⋃ n, ⋂ i ≥ n, f i :=
iSup_iInf_ge_nat_add f k
theorem union_iUnion_nat_succ (u : ℕ → Set α) : (u 0 ∪ ⋃ i, u (i + 1)) = ⋃ i, u i :=
sup_iSup_nat_succ u
theorem inter_iInter_nat_succ (u : ℕ → Set α) : (u 0 ∩ ⋂ i, u (i + 1)) = ⋂ i, u i :=
inf_iInf_nat_succ u
end Set
open Set
variable [CompleteLattice β]
theorem iSup_iUnion (s : ι → Set α) (f : α → β) : ⨆ a ∈ ⋃ i, s i, f a = ⨆ (i) (a ∈ s i), f a := by
rw [iSup_comm]
simp_rw [mem_iUnion, iSup_exists]
theorem iInf_iUnion (s : ι → Set α) (f : α → β) : ⨅ a ∈ ⋃ i, s i, f a = ⨅ (i) (a ∈ s i), f a :=
iSup_iUnion (β := βᵒᵈ) s f
theorem sSup_iUnion (t : ι → Set β) : sSup (⋃ i, t i) = ⨆ i, sSup (t i) := by
simp_rw [sSup_eq_iSup, iSup_iUnion]
theorem sSup_sUnion (s : Set (Set β)) : sSup (⋃₀ s) = ⨆ t ∈ s, sSup t := by
simp only [sUnion_eq_biUnion, sSup_eq_iSup, iSup_iUnion]
theorem sInf_sUnion (s : Set (Set β)) : sInf (⋃₀ s) = ⨅ t ∈ s, sInf t :=
sSup_sUnion (β := βᵒᵈ) s
lemma iSup_sUnion (S : Set (Set α)) (f : α → β) :
(⨆ x ∈ ⋃₀ S, f x) = ⨆ (s ∈ S) (x ∈ s), f x := by
rw [sUnion_eq_iUnion, iSup_iUnion, ← iSup_subtype'']
lemma iInf_sUnion (S : Set (Set α)) (f : α → β) :
(⨅ x ∈ ⋃₀ S, f x) = ⨅ (s ∈ S) (x ∈ s), f x := by
rw [sUnion_eq_iUnion, iInf_iUnion, ← iInf_subtype'']
lemma forall_sUnion {S : Set (Set α)} {p : α → Prop} :
(∀ x ∈ ⋃₀ S, p x) ↔ ∀ s ∈ S, ∀ x ∈ s, p x := by
simp_rw [← iInf_Prop_eq, iInf_sUnion]
lemma exists_sUnion {S : Set (Set α)} {p : α → Prop} :
(∃ x ∈ ⋃₀ S, p x) ↔ ∃ s ∈ S, ∃ x ∈ s, p x := by
simp_rw [← exists_prop, ← iSup_Prop_eq, iSup_sUnion]
| Mathlib/Data/Set/Lattice.lean | 1,896 | 1,899 | |
/-
Copyright (c) 2020 Markus Himmel. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Markus Himmel
-/
import Mathlib.CategoryTheory.Abelian.Exact
import Mathlib.CategoryTheory.Comma.Over.Basic
import Mathlib.Algebra.Category.ModuleCat.EpiMono
/-!
# Pseudoelements in abelian categories
A *pseudoelement* of an object `X` in an abelian category `C` is an equivalence class of arrows
ending in `X`, where two arrows are considered equivalent if we can find two epimorphisms with a
common domain making a commutative square with the two arrows. While the construction shows that
pseudoelements are actually subobjects of `X` rather than "elements", it is possible to chase these
pseudoelements through commutative diagrams in an abelian category to prove exactness properties.
This is done using some "diagram-chasing metatheorems" proved in this file. In many cases, a proof
in the category of abelian groups can more or less directly be converted into a proof using
pseudoelements.
A classic application of pseudoelements are diagram lemmas like the four lemma or the snake lemma.
Pseudoelements are in some ways weaker than actual elements in a concrete category. The most
important limitation is that there is no extensionality principle: If `f g : X ⟶ Y`, then
`∀ x ∈ X, f x = g x` does not necessarily imply that `f = g` (however, if `f = 0` or `g = 0`,
it does). A corollary of this is that we can not define arrows in abelian categories by dictating
their action on pseudoelements. Thus, a usual style of proofs in abelian categories is this:
First, we construct some morphism using universal properties, and then we use diagram chasing
of pseudoelements to verify that is has some desirable property such as exactness.
It should be noted that the Freyd-Mitchell embedding theorem
(see `CategoryTheory.Abelian.FreydMitchell`) gives a vastly stronger notion of
pseudoelement (in particular one that gives extensionality) and this file should be updated to
go use that instead!
## Main results
We define the type of pseudoelements of an object and, in particular, the zero pseudoelement.
We prove that every morphism maps the zero pseudoelement to the zero pseudoelement (`apply_zero`)
and that a zero morphism maps every pseudoelement to the zero pseudoelement (`zero_apply`).
Here are the metatheorems we provide:
* A morphism `f` is zero if and only if it is the zero function on pseudoelements.
* A morphism `f` is an epimorphism if and only if it is surjective on pseudoelements.
* A morphism `f` is a monomorphism if and only if it is injective on pseudoelements
if and only if `∀ a, f a = 0 → f = 0`.
* A sequence `f, g` of morphisms is exact if and only if
`∀ a, g (f a) = 0` and `∀ b, g b = 0 → ∃ a, f a = b`.
* If `f` is a morphism and `a, a'` are such that `f a = f a'`, then there is some
pseudoelement `a''` such that `f a'' = 0` and for every `g` we have
`g a' = 0 → g a = g a''`. We can think of `a''` as `a - a'`, but don't get too carried away
by that: pseudoelements of an object do not form an abelian group.
## Notations
We introduce coercions from an object of an abelian category to the set of its pseudoelements
and from a morphism to the function it induces on pseudoelements.
These coercions must be explicitly enabled via local instances:
`attribute [local instance] objectToSort homToFun`
## Implementation notes
It appears that sometimes the coercion from morphisms to functions does not work, i.e.,
writing `g a` raises a "function expected" error. This error can be fixed by writing
`(g : X ⟶ Y) a`.
## References
* [F. Borceux, *Handbook of Categorical Algebra 2*][borceux-vol2]
-/
open CategoryTheory
open CategoryTheory.Limits
open CategoryTheory.Abelian
open CategoryTheory.Preadditive
universe v u
namespace CategoryTheory.Abelian
variable {C : Type u} [Category.{v} C]
attribute [local instance] Over.coeFromHom
/-- This is just composition of morphisms in `C`. Another way to express this would be
`(Over.map f).obj a`, but our definition has nicer definitional properties. -/
def app {P Q : C} (f : P ⟶ Q) (a : Over P) : Over Q :=
a.hom ≫ f
@[simp]
theorem app_hom {P Q : C} (f : P ⟶ Q) (a : Over P) : (app f a).hom = a.hom ≫ f := rfl
/-- Two arrows `f : X ⟶ P` and `g : Y ⟶ P` are called pseudo-equal if there is some object
`R` and epimorphisms `p : R ⟶ X` and `q : R ⟶ Y` such that `p ≫ f = q ≫ g`. -/
def PseudoEqual (P : C) (f g : Over P) : Prop :=
∃ (R : C) (p : R ⟶ f.1) (q : R ⟶ g.1) (_ : Epi p) (_ : Epi q), p ≫ f.hom = q ≫ g.hom
theorem pseudoEqual_refl {P : C} : Reflexive (PseudoEqual P) :=
fun f => ⟨f.1, 𝟙 f.1, 𝟙 f.1, inferInstance, inferInstance, by simp⟩
theorem pseudoEqual_symm {P : C} : Symmetric (PseudoEqual P) :=
fun _ _ ⟨R, p, q, ep, Eq, comm⟩ => ⟨R, q, p, Eq, ep, comm.symm⟩
variable [Abelian.{v} C]
section
/-- Pseudoequality is transitive: Just take the pullback. The pullback morphisms will
be epimorphisms since in an abelian category, pullbacks of epimorphisms are epimorphisms. -/
theorem pseudoEqual_trans {P : C} : Transitive (PseudoEqual P) := by
intro f g h ⟨R, p, q, ep, Eq, comm⟩ ⟨R', p', q', ep', eq', comm'⟩
refine ⟨pullback q p', pullback.fst _ _ ≫ p, pullback.snd _ _ ≫ q',
epi_comp _ _, epi_comp _ _, ?_⟩
rw [Category.assoc, comm, ← Category.assoc, pullback.condition, Category.assoc, comm',
Category.assoc]
end
/-- The arrows with codomain `P` equipped with the equivalence relation of being pseudo-equal. -/
def Pseudoelement.setoid (P : C) : Setoid (Over P) :=
⟨_, ⟨pseudoEqual_refl, @pseudoEqual_symm _ _ _, @pseudoEqual_trans _ _ _ _⟩⟩
attribute [local instance] Pseudoelement.setoid
/-- A `Pseudoelement` of `P` is just an equivalence class of arrows ending in `P` by being
pseudo-equal. -/
def Pseudoelement (P : C) : Type max u v :=
Quotient (Pseudoelement.setoid P)
namespace Pseudoelement
/-- A coercion from an object of an abelian category to its pseudoelements. -/
def objectToSort : CoeSort C (Type max u v) :=
⟨fun P => Pseudoelement P⟩
attribute [local instance] objectToSort
scoped[Pseudoelement] attribute [instance] CategoryTheory.Abelian.Pseudoelement.objectToSort
/-- A coercion from an arrow with codomain `P` to its associated pseudoelement. -/
def overToSort {P : C} : Coe (Over P) (Pseudoelement P) :=
⟨Quot.mk (PseudoEqual P)⟩
attribute [local instance] overToSort
theorem over_coe_def {P Q : C} (a : Q ⟶ P) : (a : Pseudoelement P) = ⟦↑a⟧ := rfl
/-- If two elements are pseudo-equal, then their composition with a morphism is, too. -/
theorem pseudoApply_aux {P Q : C} (f : P ⟶ Q) (a b : Over P) : a ≈ b → app f a ≈ app f b :=
fun ⟨R, p, q, ep, Eq, comm⟩ =>
⟨R, p, q, ep, Eq, show p ≫ a.hom ≫ f = q ≫ b.hom ≫ f by rw [reassoc_of% comm]⟩
/-- A morphism `f` induces a function `pseudoApply f` on pseudoelements. -/
def pseudoApply {P Q : C} (f : P ⟶ Q) : P → Q :=
Quotient.map (fun g : Over P => app f g) (pseudoApply_aux f)
/-- A coercion from morphisms to functions on pseudoelements. -/
def homToFun {P Q : C} : CoeFun (P ⟶ Q) fun _ => P → Q :=
⟨pseudoApply⟩
attribute [local instance] homToFun
scoped[Pseudoelement] attribute [instance] CategoryTheory.Abelian.Pseudoelement.homToFun
theorem pseudoApply_mk' {P Q : C} (f : P ⟶ Q) (a : Over P) : f ⟦a⟧ = ⟦↑(a.hom ≫ f)⟧ := rfl
/-- Applying a pseudoelement to a composition of morphisms is the same as composing
with each morphism. Sadly, this is not a definitional equality, but at least it is
true. -/
theorem comp_apply {P Q R : C} (f : P ⟶ Q) (g : Q ⟶ R) (a : P) : (f ≫ g) a = g (f a) :=
Quotient.inductionOn a fun x =>
Quotient.sound <| by
simp only [app]
rw [← Category.assoc, Over.coe_hom]
/-- Composition of functions on pseudoelements is composition of morphisms. -/
theorem comp_comp {P Q R : C} (f : P ⟶ Q) (g : Q ⟶ R) : g ∘ f = f ≫ g :=
funext fun _ => (comp_apply _ _ _).symm
section Zero
/-!
In this section we prove that for every `P` there is an equivalence class that contains
precisely all the zero morphisms ending in `P` and use this to define *the* zero
pseudoelement.
-/
section
attribute [local instance] HasBinaryBiproducts.of_hasBinaryProducts
/-- The arrows pseudo-equal to a zero morphism are precisely the zero morphisms. -/
theorem pseudoZero_aux {P : C} (Q : C) (f : Over P) : f ≈ (0 : Q ⟶ P) ↔ f.hom = 0 :=
⟨fun ⟨R, p, q, _, _, comm⟩ => zero_of_epi_comp p (by simp [comm]), fun hf =>
⟨biprod f.1 Q, biprod.fst, biprod.snd, inferInstance, inferInstance, by
rw [hf, Over.coe_hom, HasZeroMorphisms.comp_zero, HasZeroMorphisms.comp_zero]⟩⟩
end
theorem zero_eq_zero' {P Q R : C} :
(⟦((0 : Q ⟶ P) : Over P)⟧ : Pseudoelement P) = ⟦((0 : R ⟶ P) : Over P)⟧ :=
Quotient.sound <| (pseudoZero_aux R _).2 rfl
/-- The zero pseudoelement is the class of a zero morphism. -/
def pseudoZero {P : C} : P :=
⟦(0 : P ⟶ P)⟧
-- Porting note: in mathlib3, we couldn't make this an instance
-- as it would have fired on `coe_sort`.
-- However now that coercions are treated differently, this is a structural instance triggered by
-- the appearance of `Pseudoelement`.
instance hasZero {P : C} : Zero P :=
⟨pseudoZero⟩
instance {P : C} : Inhabited P :=
⟨0⟩
theorem pseudoZero_def {P : C} : (0 : Pseudoelement P) = ⟦↑(0 : P ⟶ P)⟧ := rfl
@[simp]
theorem zero_eq_zero {P Q : C} : ⟦((0 : Q ⟶ P) : Over P)⟧ = (0 : Pseudoelement P) :=
zero_eq_zero'
/-- The pseudoelement induced by an arrow is zero precisely when that arrow is zero. -/
theorem pseudoZero_iff {P : C} (a : Over P) : a = (0 : P) ↔ a.hom = 0 := by
rw [← pseudoZero_aux P a]
exact Quotient.eq'
end Zero
open Pseudoelement
/-- Morphisms map the zero pseudoelement to the zero pseudoelement. -/
@[simp]
theorem apply_zero {P Q : C} (f : P ⟶ Q) : f 0 = 0 := by
rw [pseudoZero_def, pseudoApply_mk']
simp
/-- The zero morphism maps every pseudoelement to 0. -/
@[simp]
theorem zero_apply {P : C} (Q : C) (a : P) : (0 : P ⟶ Q) a = 0 :=
Quotient.inductionOn a fun a' => by
rw [pseudoZero_def, pseudoApply_mk']
simp
/-- An extensionality lemma for being the zero arrow. -/
theorem zero_morphism_ext {P Q : C} (f : P ⟶ Q) : (∀ a, f a = 0) → f = 0 := fun h => by
rw [← Category.id_comp f]
exact (pseudoZero_iff (𝟙 P ≫ f : Over Q)).1 (h (𝟙 P))
theorem zero_morphism_ext' {P Q : C} (f : P ⟶ Q) : (∀ a, f a = 0) → 0 = f :=
Eq.symm ∘ zero_morphism_ext f
theorem eq_zero_iff {P Q : C} (f : P ⟶ Q) : f = 0 ↔ ∀ a, f a = 0 :=
⟨fun h a => by simp [h], zero_morphism_ext _⟩
/-- A monomorphism is injective on pseudoelements. -/
theorem pseudo_injective_of_mono {P Q : C} (f : P ⟶ Q) [Mono f] : Function.Injective f := by
intro abar abar'
refine Quotient.inductionOn₂ abar abar' fun a a' ha => ?_
apply Quotient.sound
have : (⟦(a.hom ≫ f : Over Q)⟧ : Quotient (setoid Q)) = ⟦↑(a'.hom ≫ f)⟧ := by convert ha
have ⟨R, p, q, ep, Eq, comm⟩ := Quotient.exact this
exact ⟨R, p, q, ep, Eq, (cancel_mono f).1 <| by
simp only [Category.assoc]
exact comm⟩
/-- A morphism that is injective on pseudoelements only maps the zero element to zero. -/
theorem zero_of_map_zero {P Q : C} (f : P ⟶ Q) : Function.Injective f → ∀ a, f a = 0 → a = 0 :=
fun h a ha => by
rw [← apply_zero f] at ha
exact h ha
/-- A morphism that only maps the zero pseudoelement to zero is a monomorphism. -/
theorem mono_of_zero_of_map_zero {P Q : C} (f : P ⟶ Q) : (∀ a, f a = 0 → a = 0) → Mono f :=
fun h => (mono_iff_cancel_zero _).2 fun _ g hg =>
(pseudoZero_iff (g : Over P)).1 <|
h _ <| show f g = 0 from (pseudoZero_iff (g ≫ f : Over Q)).2 hg
section
/-- An epimorphism is surjective on pseudoelements. -/
theorem pseudo_surjective_of_epi {P Q : C} (f : P ⟶ Q) [Epi f] : Function.Surjective f :=
fun qbar =>
Quotient.inductionOn qbar fun q =>
⟨(pullback.fst f q.hom : Over P),
Quotient.sound <|
⟨pullback f q.hom, 𝟙 (pullback f q.hom), pullback.snd _ _, inferInstance, inferInstance, by
rw [Category.id_comp, ← pullback.condition, app_hom, Over.coe_hom]⟩⟩
end
/-- A morphism that is surjective on pseudoelements is an epimorphism. -/
theorem epi_of_pseudo_surjective {P Q : C} (f : P ⟶ Q) : Function.Surjective f → Epi f := by
intro h
have ⟨pbar, hpbar⟩ := h (𝟙 Q)
have ⟨p, hp⟩ := Quotient.exists_rep pbar
have : (⟦(p.hom ≫ f : Over Q)⟧ : Quotient (setoid Q)) = ⟦↑(𝟙 Q)⟧ := by
rw [← hp] at hpbar
exact hpbar
have ⟨R, x, y, _, ey, comm⟩ := Quotient.exact this
apply @epi_of_epi_fac _ _ _ _ _ (x ≫ p.hom) f y ey
dsimp at comm
rw [Category.assoc, comm]
apply Category.comp_id
section
/-- Two morphisms in an exact sequence are exact on pseudoelements. -/
theorem pseudo_exact_of_exact {S : ShortComplex C} (hS : S.Exact) :
∀ b, S.g b = 0 → ∃ a, S.f a = b :=
fun b' =>
Quotient.inductionOn b' fun b hb => by
have hb' : b.hom ≫ S.g = 0 := (pseudoZero_iff _).1 hb
-- By exactness, `b` factors through `im f = ker g` via some `c`.
obtain ⟨c, hc⟩ := KernelFork.IsLimit.lift' hS.isLimitImage _ hb'
-- We compute the pullback of the map into the image and `c`.
-- The pseudoelement induced by the first pullback map will be our preimage.
use pullback.fst (Abelian.factorThruImage S.f) c
-- It remains to show that the image of this element under `f` is pseudo-equal to `b`.
apply Quotient.sound
refine ⟨pullback (Abelian.factorThruImage S.f) c, 𝟙 _,
pullback.snd _ _, inferInstance, inferInstance, ?_⟩
-- Now we can verify that the diagram commutes.
calc
𝟙 (pullback (Abelian.factorThruImage S.f) c) ≫ pullback.fst _ _ ≫ S.f =
pullback.fst _ _ ≫ S.f :=
Category.id_comp _
_ = pullback.fst _ _ ≫ Abelian.factorThruImage S.f ≫ kernel.ι (cokernel.π S.f) := by
rw [Abelian.image.fac]
_ = (pullback.snd _ _ ≫ c) ≫ kernel.ι (cokernel.π S.f) := by
rw [← Category.assoc, pullback.condition]
_ = pullback.snd _ _ ≫ b.hom := by
rw [Category.assoc]
congr
end
theorem apply_eq_zero_of_comp_eq_zero {P Q R : C} (f : Q ⟶ R) (a : P ⟶ Q) : a ≫ f = 0 → f a = 0 :=
fun h => by simp [over_coe_def, pseudoApply_mk', Over.coe_hom, h]
section
/-- If two morphisms are exact on pseudoelements, they are exact. -/
theorem exact_of_pseudo_exact (S : ShortComplex C)
(hS : ∀ b, S.g b = 0 → ∃ a, S.f a = b) : S.Exact :=
(S.exact_iff_kernel_ι_comp_cokernel_π_zero).2 (by
-- If we apply `g` to the pseudoelement induced by its kernel, we get 0 (of course!).
have : S.g (kernel.ι S.g) = 0 := apply_eq_zero_of_comp_eq_zero _ _ (kernel.condition _)
-- By pseudo-exactness, we get a preimage.
obtain ⟨a', ha⟩ := hS _ this
obtain ⟨a, ha'⟩ := Quotient.exists_rep a'
rw [← ha'] at ha
obtain ⟨Z, r, q, _, eq, comm⟩ := Quotient.exact ha
-- Consider the pullback of `kernel.ι (cokernel.π f)` and `kernel.ι g`.
-- The commutative diagram given by the pseudo-equality `f a = b` induces
-- a cone over this pullback, so we get a factorization `z`.
obtain ⟨z, _, hz₂⟩ := @pullback.lift' _ _ _ _ _ _ (kernel.ι (cokernel.π S.f))
(kernel.ι S.g) _ (r ≫ a.hom ≫ Abelian.factorThruImage S.f) q (by
simp only [Category.assoc, Abelian.image.fac]
exact comm)
-- Let's give a name to the second pullback morphism.
let j : pullback (kernel.ι (cokernel.π S.f)) (kernel.ι S.g) ⟶ kernel S.g := pullback.snd _ _
-- Since `q` is an epimorphism, in particular this means that `j` is an epimorphism.
haveI pe : Epi j := epi_of_epi_fac hz₂
-- But it is also a monomorphism, because `kernel.ι (cokernel.π f)` is: A kernel is
-- always a monomorphism and the pullback of a monomorphism is a monomorphism.
-- But mono + epi = iso, so `j` is an isomorphism.
haveI : IsIso j := isIso_of_mono_of_epi _
-- But then `kernel.ι g` can be expressed using all of the maps of the pullback square, and we
-- are done.
rw [(Iso.eq_inv_comp (asIso j)).2 pullback.condition.symm]
simp only [Category.assoc, kernel.condition, HasZeroMorphisms.comp_zero])
end
/-- If two pseudoelements `x` and `y` have the same image under some morphism `f`, then we can form
their "difference" `z`. This pseudoelement has the properties that `f z = 0` and for all
morphisms `g`, if `g y = 0` then `g z = g x`. -/
theorem sub_of_eq_image {P Q : C} (f : P ⟶ Q) (x y : P) :
f x = f y → ∃ z, f z = 0 ∧ ∀ (R : C) (g : P ⟶ R), (g : P ⟶ R) y = 0 → g z = g x :=
Quotient.inductionOn₂ x y fun a a' h =>
match Quotient.exact h with
| ⟨R, p, q, ep, _, comm⟩ =>
let a'' : R ⟶ P := (p ≫ a.hom : R ⟶ P) - (q ≫ a'.hom : R ⟶ P)
⟨a'',
⟨show ⟦(a'' ≫ f : Over Q)⟧ = ⟦↑(0 : Q ⟶ Q)⟧ by
dsimp at comm
simp [a'', sub_eq_zero.2 comm],
fun Z g hh => by
| obtain ⟨X, p', q', ep', _, comm'⟩ := Quotient.exact hh
have : a'.hom ≫ g = 0 := by
apply (epi_iff_cancel_zero _).1 ep' _ (a'.hom ≫ g)
simpa using comm'
apply Quotient.sound
-- Can we prevent quotient.sound from giving us this weird `coe_b` thingy?
change app g (a'' : Over P) ≈ app g a
exact ⟨R, 𝟙 R, p, inferInstance, ep, by simp [a'', sub_eq_add_neg, this]⟩⟩⟩
variable [Limits.HasPullbacks C]
/-- If `f : P ⟶ R` and `g : Q ⟶ R` are morphisms and `p : P` and `q : Q` are pseudoelements such
that `f p = g q`, then there is some `s : pullback f g` such that `fst s = p` and `snd s = q`.
Remark: Borceux claims that `s` is unique, but this is false. See
`Counterexamples/Pseudoelement.lean` for details. -/
theorem pseudo_pullback {P Q R : C} {f : P ⟶ R} {g : Q ⟶ R} {p : P} {q : Q} :
f p = g q →
∃ s, pullback.fst f g s = p ∧ pullback.snd f g s = q :=
Quotient.inductionOn₂ p q fun x y h => by
obtain ⟨Z, a, b, ea, eb, comm⟩ := Quotient.exact h
obtain ⟨l, hl₁, hl₂⟩ := @pullback.lift' _ _ _ _ _ _ f g _ (a ≫ x.hom) (b ≫ y.hom) (by
simp only [Category.assoc]
exact comm)
exact ⟨l, ⟨Quotient.sound ⟨Z, 𝟙 Z, a, inferInstance, ea, by rwa [Category.id_comp]⟩,
Quotient.sound ⟨Z, 𝟙 Z, b, inferInstance, eb, by rwa [Category.id_comp]⟩⟩⟩
section Module
/-- In the category `Module R`, if `x` and `y` are pseudoequal, then the range of the associated
| Mathlib/CategoryTheory/Abelian/Pseudoelements.lean | 399 | 428 |
/-
Copyright (c) 2022 Yaël Dillies, Sara Rousta. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Yaël Dillies, Sara Rousta
-/
import Mathlib.Logic.Equiv.Set
import Mathlib.Order.Interval.Set.OrderEmbedding
import Mathlib.Order.SetNotation
/-!
# Properties of unbundled upper/lower sets
This file proves results on `IsUpperSet` and `IsLowerSet`, including their interactions with
set operations, images, preimages and order duals, and properties that reflect stronger assumptions
on the underlying order (such as `PartialOrder` and `LinearOrder`).
## TODO
* Lattice structure on antichains.
* Order equivalence between upper/lower sets and antichains.
-/
open OrderDual Set
variable {α β : Type*} {ι : Sort*} {κ : ι → Sort*}
attribute [aesop norm unfold] IsUpperSet IsLowerSet
section LE
variable [LE α] {s t : Set α} {a : α}
theorem isUpperSet_empty : IsUpperSet (∅ : Set α) := fun _ _ _ => id
theorem isLowerSet_empty : IsLowerSet (∅ : Set α) := fun _ _ _ => id
theorem isUpperSet_univ : IsUpperSet (univ : Set α) := fun _ _ _ => id
theorem isLowerSet_univ : IsLowerSet (univ : Set α) := fun _ _ _ => id
theorem IsUpperSet.compl (hs : IsUpperSet s) : IsLowerSet sᶜ := fun _a _b h hb ha => hb <| hs h ha
theorem IsLowerSet.compl (hs : IsLowerSet s) : IsUpperSet sᶜ := fun _a _b h hb ha => hb <| hs h ha
@[simp]
theorem isUpperSet_compl : IsUpperSet sᶜ ↔ IsLowerSet s :=
⟨fun h => by
convert h.compl
rw [compl_compl], IsLowerSet.compl⟩
@[simp]
theorem isLowerSet_compl : IsLowerSet sᶜ ↔ IsUpperSet s :=
⟨fun h => by
convert h.compl
rw [compl_compl], IsUpperSet.compl⟩
theorem IsUpperSet.union (hs : IsUpperSet s) (ht : IsUpperSet t) : IsUpperSet (s ∪ t) :=
fun _ _ h => Or.imp (hs h) (ht h)
theorem IsLowerSet.union (hs : IsLowerSet s) (ht : IsLowerSet t) : IsLowerSet (s ∪ t) :=
fun _ _ h => Or.imp (hs h) (ht h)
theorem IsUpperSet.inter (hs : IsUpperSet s) (ht : IsUpperSet t) : IsUpperSet (s ∩ t) :=
fun _ _ h => And.imp (hs h) (ht h)
theorem IsLowerSet.inter (hs : IsLowerSet s) (ht : IsLowerSet t) : IsLowerSet (s ∩ t) :=
fun _ _ h => And.imp (hs h) (ht h)
theorem isUpperSet_sUnion {S : Set (Set α)} (hf : ∀ s ∈ S, IsUpperSet s) : IsUpperSet (⋃₀ S) :=
fun _ _ h => Exists.imp fun _ hs => ⟨hs.1, hf _ hs.1 h hs.2⟩
theorem isLowerSet_sUnion {S : Set (Set α)} (hf : ∀ s ∈ S, IsLowerSet s) : IsLowerSet (⋃₀ S) :=
fun _ _ h => Exists.imp fun _ hs => ⟨hs.1, hf _ hs.1 h hs.2⟩
theorem isUpperSet_iUnion {f : ι → Set α} (hf : ∀ i, IsUpperSet (f i)) : IsUpperSet (⋃ i, f i) :=
isUpperSet_sUnion <| forall_mem_range.2 hf
theorem isLowerSet_iUnion {f : ι → Set α} (hf : ∀ i, IsLowerSet (f i)) : IsLowerSet (⋃ i, f i) :=
isLowerSet_sUnion <| forall_mem_range.2 hf
theorem isUpperSet_iUnion₂ {f : ∀ i, κ i → Set α} (hf : ∀ i j, IsUpperSet (f i j)) :
IsUpperSet (⋃ (i) (j), f i j) :=
isUpperSet_iUnion fun i => isUpperSet_iUnion <| hf i
theorem isLowerSet_iUnion₂ {f : ∀ i, κ i → Set α} (hf : ∀ i j, IsLowerSet (f i j)) :
IsLowerSet (⋃ (i) (j), f i j) :=
isLowerSet_iUnion fun i => isLowerSet_iUnion <| hf i
theorem isUpperSet_sInter {S : Set (Set α)} (hf : ∀ s ∈ S, IsUpperSet s) : IsUpperSet (⋂₀ S) :=
fun _ _ h => forall₂_imp fun s hs => hf s hs h
theorem isLowerSet_sInter {S : Set (Set α)} (hf : ∀ s ∈ S, IsLowerSet s) : IsLowerSet (⋂₀ S) :=
fun _ _ h => forall₂_imp fun s hs => hf s hs h
theorem isUpperSet_iInter {f : ι → Set α} (hf : ∀ i, IsUpperSet (f i)) : IsUpperSet (⋂ i, f i) :=
isUpperSet_sInter <| forall_mem_range.2 hf
theorem isLowerSet_iInter {f : ι → Set α} (hf : ∀ i, IsLowerSet (f i)) : IsLowerSet (⋂ i, f i) :=
isLowerSet_sInter <| forall_mem_range.2 hf
theorem isUpperSet_iInter₂ {f : ∀ i, κ i → Set α} (hf : ∀ i j, IsUpperSet (f i j)) :
IsUpperSet (⋂ (i) (j), f i j) :=
isUpperSet_iInter fun i => isUpperSet_iInter <| hf i
theorem isLowerSet_iInter₂ {f : ∀ i, κ i → Set α} (hf : ∀ i j, IsLowerSet (f i j)) :
IsLowerSet (⋂ (i) (j), f i j) :=
isLowerSet_iInter fun i => isLowerSet_iInter <| hf i
@[simp]
theorem isLowerSet_preimage_ofDual_iff : IsLowerSet (ofDual ⁻¹' s) ↔ IsUpperSet s :=
Iff.rfl
@[simp]
theorem isUpperSet_preimage_ofDual_iff : IsUpperSet (ofDual ⁻¹' s) ↔ IsLowerSet s :=
Iff.rfl
@[simp]
theorem isLowerSet_preimage_toDual_iff {s : Set αᵒᵈ} : IsLowerSet (toDual ⁻¹' s) ↔ IsUpperSet s :=
Iff.rfl
@[simp]
theorem isUpperSet_preimage_toDual_iff {s : Set αᵒᵈ} : IsUpperSet (toDual ⁻¹' s) ↔ IsLowerSet s :=
Iff.rfl
alias ⟨_, IsUpperSet.toDual⟩ := isLowerSet_preimage_ofDual_iff
alias ⟨_, IsLowerSet.toDual⟩ := isUpperSet_preimage_ofDual_iff
alias ⟨_, IsUpperSet.ofDual⟩ := isLowerSet_preimage_toDual_iff
alias ⟨_, IsLowerSet.ofDual⟩ := isUpperSet_preimage_toDual_iff
lemma IsUpperSet.isLowerSet_preimage_coe (hs : IsUpperSet s) :
IsLowerSet ((↑) ⁻¹' t : Set s) ↔ ∀ b ∈ s, ∀ c ∈ t, b ≤ c → b ∈ t := by aesop
lemma IsLowerSet.isUpperSet_preimage_coe (hs : IsLowerSet s) :
IsUpperSet ((↑) ⁻¹' t : Set s) ↔ ∀ b ∈ s, ∀ c ∈ t, c ≤ b → b ∈ t := by aesop
lemma IsUpperSet.sdiff (hs : IsUpperSet s) (ht : ∀ b ∈ s, ∀ c ∈ t, b ≤ c → b ∈ t) :
IsUpperSet (s \ t) :=
fun _b _c hbc hb ↦ ⟨hs hbc hb.1, fun hc ↦ hb.2 <| ht _ hb.1 _ hc hbc⟩
lemma IsLowerSet.sdiff (hs : IsLowerSet s) (ht : ∀ b ∈ s, ∀ c ∈ t, c ≤ b → b ∈ t) :
IsLowerSet (s \ t) :=
fun _b _c hcb hb ↦ ⟨hs hcb hb.1, fun hc ↦ hb.2 <| ht _ hb.1 _ hc hcb⟩
lemma IsUpperSet.sdiff_of_isLowerSet (hs : IsUpperSet s) (ht : IsLowerSet t) : IsUpperSet (s \ t) :=
hs.sdiff <| by aesop
lemma IsLowerSet.sdiff_of_isUpperSet (hs : IsLowerSet s) (ht : IsUpperSet t) : IsLowerSet (s \ t) :=
hs.sdiff <| by aesop
lemma IsUpperSet.erase (hs : IsUpperSet s) (has : ∀ b ∈ s, b ≤ a → b = a) : IsUpperSet (s \ {a}) :=
hs.sdiff <| by simpa using has
lemma IsLowerSet.erase (hs : IsLowerSet s) (has : ∀ b ∈ s, a ≤ b → b = a) : IsLowerSet (s \ {a}) :=
hs.sdiff <| by simpa using has
end LE
section Preorder
variable [Preorder α] [Preorder β] {s : Set α} {p : α → Prop} (a : α)
theorem isUpperSet_Ici : IsUpperSet (Ici a) := fun _ _ => ge_trans
theorem isLowerSet_Iic : IsLowerSet (Iic a) := fun _ _ => le_trans
theorem isUpperSet_Ioi : IsUpperSet (Ioi a) := fun _ _ => flip lt_of_lt_of_le
theorem isLowerSet_Iio : IsLowerSet (Iio a) := fun _ _ => lt_of_le_of_lt
theorem isUpperSet_iff_Ici_subset : IsUpperSet s ↔ ∀ ⦃a⦄, a ∈ s → Ici a ⊆ s := by
simp [IsUpperSet, subset_def, @forall_swap (_ ∈ s)]
theorem isLowerSet_iff_Iic_subset : IsLowerSet s ↔ ∀ ⦃a⦄, a ∈ s → Iic a ⊆ s := by
simp [IsLowerSet, subset_def, @forall_swap (_ ∈ s)]
alias ⟨IsUpperSet.Ici_subset, _⟩ := isUpperSet_iff_Ici_subset
alias ⟨IsLowerSet.Iic_subset, _⟩ := isLowerSet_iff_Iic_subset
theorem IsUpperSet.Ioi_subset (h : IsUpperSet s) ⦃a⦄ (ha : a ∈ s) : Ioi a ⊆ s :=
Ioi_subset_Ici_self.trans <| h.Ici_subset ha
theorem IsLowerSet.Iio_subset (h : IsLowerSet s) ⦃a⦄ (ha : a ∈ s) : Iio a ⊆ s :=
h.toDual.Ioi_subset ha
theorem IsUpperSet.ordConnected (h : IsUpperSet s) : s.OrdConnected :=
⟨fun _ ha _ _ => Icc_subset_Ici_self.trans <| h.Ici_subset ha⟩
theorem IsLowerSet.ordConnected (h : IsLowerSet s) : s.OrdConnected :=
⟨fun _ _ _ hb => Icc_subset_Iic_self.trans <| h.Iic_subset hb⟩
theorem IsUpperSet.preimage (hs : IsUpperSet s) {f : β → α} (hf : Monotone f) :
IsUpperSet (f ⁻¹' s : Set β) := fun _ _ h => hs <| hf h
theorem IsLowerSet.preimage (hs : IsLowerSet s) {f : β → α} (hf : Monotone f) :
IsLowerSet (f ⁻¹' s : Set β) := fun _ _ h => hs <| hf h
theorem IsUpperSet.image (hs : IsUpperSet s) (f : α ≃o β) : IsUpperSet (f '' s : Set β) := by
change IsUpperSet ((f : α ≃ β) '' s)
rw [Set.image_equiv_eq_preimage_symm]
exact hs.preimage f.symm.monotone
theorem IsLowerSet.image (hs : IsLowerSet s) (f : α ≃o β) : IsLowerSet (f '' s : Set β) := by
change IsLowerSet ((f : α ≃ β) '' s)
rw [Set.image_equiv_eq_preimage_symm]
exact hs.preimage f.symm.monotone
theorem OrderEmbedding.image_Ici (e : α ↪o β) (he : IsUpperSet (range e)) (a : α) :
e '' Ici a = Ici (e a) := by
rw [← e.preimage_Ici, image_preimage_eq_inter_range,
inter_eq_left.2 <| he.Ici_subset (mem_range_self _)]
theorem OrderEmbedding.image_Iic (e : α ↪o β) (he : IsLowerSet (range e)) (a : α) :
e '' Iic a = Iic (e a) :=
e.dual.image_Ici he a
theorem OrderEmbedding.image_Ioi (e : α ↪o β) (he : IsUpperSet (range e)) (a : α) :
e '' Ioi a = Ioi (e a) := by
rw [← e.preimage_Ioi, image_preimage_eq_inter_range,
inter_eq_left.2 <| he.Ioi_subset (mem_range_self _)]
theorem OrderEmbedding.image_Iio (e : α ↪o β) (he : IsLowerSet (range e)) (a : α) :
e '' Iio a = Iio (e a) :=
e.dual.image_Ioi he a
@[simp]
theorem Set.monotone_mem : Monotone (· ∈ s) ↔ IsUpperSet s :=
Iff.rfl
@[simp]
theorem Set.antitone_mem : Antitone (· ∈ s) ↔ IsLowerSet s :=
forall_swap
@[simp]
theorem isUpperSet_setOf : IsUpperSet { a | p a } ↔ Monotone p :=
Iff.rfl
@[simp]
theorem isLowerSet_setOf : IsLowerSet { a | p a } ↔ Antitone p :=
forall_swap
lemma IsUpperSet.upperBounds_subset (hs : IsUpperSet s) : s.Nonempty → upperBounds s ⊆ s :=
fun ⟨_a, ha⟩ _b hb ↦ hs (hb ha) ha
lemma IsLowerSet.lowerBounds_subset (hs : IsLowerSet s) : s.Nonempty → lowerBounds s ⊆ s :=
fun ⟨_a, ha⟩ _b hb ↦ hs (hb ha) ha
section OrderTop
variable [OrderTop α]
theorem IsLowerSet.top_mem (hs : IsLowerSet s) : ⊤ ∈ s ↔ s = univ :=
⟨fun h => eq_univ_of_forall fun _ => hs le_top h, fun h => h.symm ▸ mem_univ _⟩
theorem IsUpperSet.top_mem (hs : IsUpperSet s) : ⊤ ∈ s ↔ s.Nonempty :=
⟨fun h => ⟨_, h⟩, fun ⟨_a, ha⟩ => hs le_top ha⟩
theorem IsUpperSet.not_top_mem (hs : IsUpperSet s) : ⊤ ∉ s ↔ s = ∅ :=
hs.top_mem.not.trans not_nonempty_iff_eq_empty
end OrderTop
section OrderBot
variable [OrderBot α]
theorem IsUpperSet.bot_mem (hs : IsUpperSet s) : ⊥ ∈ s ↔ s = univ :=
⟨fun h => eq_univ_of_forall fun _ => hs bot_le h, fun h => h.symm ▸ mem_univ _⟩
theorem IsLowerSet.bot_mem (hs : IsLowerSet s) : ⊥ ∈ s ↔ s.Nonempty :=
⟨fun h => ⟨_, h⟩, fun ⟨_a, ha⟩ => hs bot_le ha⟩
theorem IsLowerSet.not_bot_mem (hs : IsLowerSet s) : ⊥ ∉ s ↔ s = ∅ :=
hs.bot_mem.not.trans not_nonempty_iff_eq_empty
end OrderBot
section NoMaxOrder
variable [NoMaxOrder α]
theorem IsUpperSet.not_bddAbove (hs : IsUpperSet s) : s.Nonempty → ¬BddAbove s := by
rintro ⟨a, ha⟩ ⟨b, hb⟩
obtain ⟨c, hc⟩ := exists_gt b
exact hc.not_le (hb <| hs ((hb ha).trans hc.le) ha)
theorem not_bddAbove_Ici : ¬BddAbove (Ici a) :=
(isUpperSet_Ici _).not_bddAbove nonempty_Ici
theorem not_bddAbove_Ioi : ¬BddAbove (Ioi a) :=
(isUpperSet_Ioi _).not_bddAbove nonempty_Ioi
end NoMaxOrder
section NoMinOrder
variable [NoMinOrder α]
theorem IsLowerSet.not_bddBelow (hs : IsLowerSet s) : s.Nonempty → ¬BddBelow s := by
rintro ⟨a, ha⟩ ⟨b, hb⟩
obtain ⟨c, hc⟩ := exists_lt b
exact hc.not_le (hb <| hs (hc.le.trans <| hb ha) ha)
theorem not_bddBelow_Iic : ¬BddBelow (Iic a) :=
(isLowerSet_Iic _).not_bddBelow nonempty_Iic
theorem not_bddBelow_Iio : ¬BddBelow (Iio a) :=
(isLowerSet_Iio _).not_bddBelow nonempty_Iio
end NoMinOrder
end Preorder
section PartialOrder
variable [PartialOrder α] {s : Set α}
theorem isUpperSet_iff_forall_lt : IsUpperSet s ↔ ∀ ⦃a b : α⦄, a < b → a ∈ s → b ∈ s :=
forall_congr' fun a => by simp [le_iff_eq_or_lt, or_imp, forall_and]
theorem isLowerSet_iff_forall_lt : IsLowerSet s ↔ ∀ ⦃a b : α⦄, b < a → a ∈ s → b ∈ s :=
forall_congr' fun a => by simp [le_iff_eq_or_lt, or_imp, forall_and]
theorem isUpperSet_iff_Ioi_subset : IsUpperSet s ↔ ∀ ⦃a⦄, a ∈ s → Ioi a ⊆ s := by
simp [isUpperSet_iff_forall_lt, subset_def, @forall_swap (_ ∈ s)]
theorem isLowerSet_iff_Iio_subset : IsLowerSet s ↔ ∀ ⦃a⦄, a ∈ s → Iio a ⊆ s := by
simp [isLowerSet_iff_forall_lt, subset_def, @forall_swap (_ ∈ s)]
end PartialOrder
section LinearOrder
variable [LinearOrder α] {s t : Set α}
theorem IsUpperSet.total (hs : IsUpperSet s) (ht : IsUpperSet t) : s ⊆ t ∨ t ⊆ s := by
by_contra! h
simp_rw [Set.not_subset] at h
obtain ⟨⟨a, has, hat⟩, b, hbt, hbs⟩ := h
obtain hab | hba := le_total a b
· exact hbs (hs hab has)
· exact hat (ht hba hbt)
theorem IsLowerSet.total (hs : IsLowerSet s) (ht : IsLowerSet t) : s ⊆ t ∨ t ⊆ s :=
hs.toDual.total ht.toDual
end LinearOrder
| Mathlib/Order/UpperLower/Basic.lean | 1,264 | 1,265 | |
/-
Copyright (c) 2021 Floris van Doorn. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Floris van Doorn
-/
import Mathlib.Algebra.Group.Basic
import Mathlib.Algebra.Order.Monoid.Unbundled.Basic
import Mathlib.Order.Lattice
/-!
# Ordered Subtraction
This file proves lemmas relating (truncated) subtraction with an order. We provide a class
`OrderedSub` stating that `a - b ≤ c ↔ a ≤ c + b`.
The subtraction discussed here could both be normal subtraction in an additive group or truncated
subtraction on a canonically ordered monoid (`ℕ`, `Multiset`, `PartENat`, `ENNReal`, ...)
## Implementation details
`OrderedSub` is a mixin type-class, so that we can use the results in this file even in cases
where we don't have a `CanonicallyOrderedAdd` instance
(even though that is our main focus). Conversely, this means we can use
`CanonicallyOrderedAdd` without necessarily having to define a subtraction.
The results in this file are ordered by the type-class assumption needed to prove it.
This means that similar results might not be close to each other. Furthermore, we don't prove
implications if a bi-implication can be proven under the same assumptions.
Lemmas using this class are named using `tsub` instead of `sub` (short for "truncated subtraction").
This is to avoid naming conflicts with similar lemmas about ordered groups.
We provide a second version of most results that require `[AddLeftReflectLE α]`. In the
second version we replace this type-class assumption by explicit `AddLECancellable` assumptions.
TODO: maybe we should make a multiplicative version of this, so that we can replace some identical
lemmas about subtraction/division in `Ordered[Add]CommGroup` with these.
TODO: generalize `Nat.le_of_le_of_sub_le_sub_right`, `Nat.sub_le_sub_right_iff`,
`Nat.mul_self_sub_mul_self_eq`
-/
variable {α : Type*}
/-- `OrderedSub α` means that `α` has a subtraction characterized by `a - b ≤ c ↔ a ≤ c + b`.
In other words, `a - b` is the least `c` such that `a ≤ b + c`.
This is satisfied both by the subtraction in additive ordered groups and by truncated subtraction
in canonically ordered monoids on many specific types.
-/
class OrderedSub (α : Type*) [LE α] [Add α] [Sub α] : Prop where
/-- `a - b` provides a lower bound on `c` such that `a ≤ c + b`. -/
tsub_le_iff_right : ∀ a b c : α, a - b ≤ c ↔ a ≤ c + b
section Add
@[simp]
theorem tsub_le_iff_right [LE α] [Add α] [Sub α] [OrderedSub α] {a b c : α} :
a - b ≤ c ↔ a ≤ c + b :=
OrderedSub.tsub_le_iff_right a b c
variable [Preorder α] [Add α] [Sub α] [OrderedSub α] {a b : α}
/-- See `add_tsub_cancel_right` for the equality if `AddLeftReflectLE α`. -/
theorem add_tsub_le_right : a + b - b ≤ a :=
tsub_le_iff_right.mpr le_rfl
theorem le_tsub_add : b ≤ b - a + a :=
tsub_le_iff_right.mp le_rfl
end Add
/-! ### Preorder -/
section OrderedAddCommSemigroup
section Preorder
variable [Preorder α]
section AddCommSemigroup
variable [AddCommSemigroup α] [Sub α] [OrderedSub α] {a b c d : α}
/- TODO: Most results can be generalized to [Add α] [@Std.Commutative α (· + ·)] -/
theorem tsub_le_iff_left : a - b ≤ c ↔ a ≤ b + c := by rw [tsub_le_iff_right, add_comm]
theorem le_add_tsub : a ≤ b + (a - b) :=
tsub_le_iff_left.mp le_rfl
/-- See `add_tsub_cancel_left` for the equality if `AddLeftReflectLE α`. -/
theorem add_tsub_le_left : a + b - a ≤ b :=
tsub_le_iff_left.mpr le_rfl
@[gcongr] theorem tsub_le_tsub_right (h : a ≤ b) (c : α) : a - c ≤ b - c :=
tsub_le_iff_left.mpr <| h.trans le_add_tsub
theorem tsub_le_iff_tsub_le : a - b ≤ c ↔ a - c ≤ b := by rw [tsub_le_iff_left, tsub_le_iff_right]
/-- See `tsub_tsub_cancel_of_le` for the equality. -/
theorem tsub_tsub_le : b - (b - a) ≤ a :=
tsub_le_iff_right.mpr le_add_tsub
section Cov
variable [AddLeftMono α]
@[gcongr] theorem tsub_le_tsub_left (h : a ≤ b) (c : α) : c - b ≤ c - a :=
tsub_le_iff_left.mpr <| le_add_tsub.trans <| add_le_add_right h _
@[gcongr] theorem tsub_le_tsub (hab : a ≤ b) (hcd : c ≤ d) : a - d ≤ b - c :=
(tsub_le_tsub_right hab _).trans <| tsub_le_tsub_left hcd _
theorem antitone_const_tsub : Antitone fun x => c - x := fun _ _ hxy => tsub_le_tsub rfl.le hxy
/-- See `add_tsub_assoc_of_le` for the equality. -/
theorem add_tsub_le_assoc : a + b - c ≤ a + (b - c) := by
rw [tsub_le_iff_left, add_left_comm]
exact add_le_add_left le_add_tsub a
/-- See `tsub_add_eq_add_tsub` for the equality. -/
theorem add_tsub_le_tsub_add : a + b - c ≤ a - c + b := by
rw [add_comm, add_comm _ b]
exact add_tsub_le_assoc
theorem add_le_add_add_tsub : a + b ≤ a + c + (b - c) := by
rw [add_assoc]
exact add_le_add_left le_add_tsub a
theorem le_tsub_add_add : a + b ≤ a - c + (b + c) := by
rw [add_comm a, add_comm (a - c)]
exact add_le_add_add_tsub
theorem tsub_le_tsub_add_tsub : a - c ≤ a - b + (b - c) := by
rw [tsub_le_iff_left, ← add_assoc, add_right_comm]
exact le_add_tsub.trans (add_le_add_right le_add_tsub _)
theorem tsub_tsub_tsub_le_tsub : c - a - (c - b) ≤ b - a := by
rw [tsub_le_iff_left, tsub_le_iff_left, add_left_comm]
exact le_tsub_add.trans (add_le_add_left le_add_tsub _)
theorem tsub_tsub_le_tsub_add {a b c : α} : a - (b - c) ≤ a - b + c :=
tsub_le_iff_right.2 <|
calc
a ≤ a - b + b := le_tsub_add
_ ≤ a - b + (c + (b - c)) := add_le_add_left le_add_tsub _
_ = a - b + c + (b - c) := (add_assoc _ _ _).symm
/-- See `tsub_add_tsub_comm` for the equality. -/
theorem add_tsub_add_le_tsub_add_tsub : a + b - (c + d) ≤ a - c + (b - d) := by
rw [add_comm c, tsub_le_iff_left, add_assoc, ← tsub_le_iff_left, ← tsub_le_iff_left]
refine (tsub_le_tsub_right add_tsub_le_assoc c).trans ?_
rw [add_comm a, add_comm (a - c)]
exact add_tsub_le_assoc
/-- See `add_tsub_add_eq_tsub_left` for the equality. -/
theorem add_tsub_add_le_tsub_left : a + b - (a + c) ≤ b - c := by
rw [tsub_le_iff_left, add_assoc]
exact add_le_add_left le_add_tsub _
/-- See `add_tsub_add_eq_tsub_right` for the equality. -/
theorem add_tsub_add_le_tsub_right : a + c - (b + c) ≤ a - b := by
rw [tsub_le_iff_left, add_right_comm]
exact add_le_add_right le_add_tsub c
end Cov
/-! #### Lemmas that assume that an element is `AddLECancellable` -/
namespace AddLECancellable
protected theorem le_add_tsub_swap (hb : AddLECancellable b) : a ≤ b + a - b :=
hb le_add_tsub
protected theorem le_add_tsub (hb : AddLECancellable b) : a ≤ a + b - b := by
rw [add_comm]
exact hb.le_add_tsub_swap
protected theorem le_tsub_of_add_le_left (ha : AddLECancellable a) (h : a + b ≤ c) : b ≤ c - a :=
ha <| h.trans le_add_tsub
protected theorem le_tsub_of_add_le_right (hb : AddLECancellable b) (h : a + b ≤ c) : a ≤ c - b :=
hb.le_tsub_of_add_le_left <| by rwa [add_comm]
end AddLECancellable
/-! ### Lemmas where addition is order-reflecting -/
section Contra
variable [AddLeftReflectLE α]
theorem le_add_tsub_swap : a ≤ b + a - b :=
Contravariant.AddLECancellable.le_add_tsub_swap
theorem le_add_tsub' : a ≤ a + b - b :=
Contravariant.AddLECancellable.le_add_tsub
theorem le_tsub_of_add_le_left (h : a + b ≤ c) : b ≤ c - a :=
| Contravariant.AddLECancellable.le_tsub_of_add_le_left h
theorem le_tsub_of_add_le_right (h : a + b ≤ c) : a ≤ c - b :=
| Mathlib/Algebra/Order/Sub/Defs.lean | 204 | 206 |
/-
Copyright (c) 2019 Sébastien Gouëzel. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Sébastien Gouëzel
-/
import Mathlib.Data.Bundle
import Mathlib.Data.Set.Image
import Mathlib.Topology.CompactOpen
import Mathlib.Topology.PartialHomeomorph
import Mathlib.Topology.Order.Basic
/-!
# Trivializations
## Main definitions
### Basic definitions
* `Trivialization F p` : structure extending partial homeomorphisms, defining a local
trivialization of a topological space `Z` with projection `p` and fiber `F`.
* `Pretrivialization F proj` : trivialization as a partial equivalence, mainly used when the
topology on the total space has not yet been defined.
### Operations on bundles
We provide the following operations on `Trivialization`s.
* `Trivialization.compHomeomorph`: given a local trivialization `e` of a fiber bundle
`p : Z → B` and a homeomorphism `h : Z' ≃ₜ Z`, returns a local trivialization of the fiber bundle
`p ∘ h`.
## Implementation notes
Previously, in mathlib, there was a structure `topological_vector_bundle.trivialization` which
extended another structure `topological_fiber_bundle.trivialization` by a linearity hypothesis. As
of PR https://github.com/leanprover-community/mathlib3/pull/17359, we have changed this to a single structure
`Trivialization` (no namespace), together with a mixin class `Trivialization.IsLinear`.
This permits all the *data* of a vector bundle to be held at the level of fiber bundles, so that the
same trivializations can underlie an object's structure as (say) a vector bundle over `ℂ` and as a
vector bundle over `ℝ`, as well as its structure simply as a fiber bundle.
This might be a little surprising, given the general trend of the library to ever-increased
bundling. But in this case the typical motivation for more bundling does not apply: there is no
algebraic or order structure on the whole type of linear (say) trivializations of a bundle.
Indeed, since trivializations only have meaning on their base sets (taking junk values outside), the
type of linear trivializations is not even particularly well-behaved.
-/
open TopologicalSpace Filter Set Bundle Function
open scoped Topology
variable {B : Type*} (F : Type*) {E : B → Type*}
variable {Z : Type*} [TopologicalSpace B] [TopologicalSpace F] {proj : Z → B}
/-- This structure contains the information left for a local trivialization (which is implemented
below as `Trivialization F proj`) if the total space has not been given a topology, but we
have a topology on both the fiber and the base space. Through the construction
`topological_fiber_prebundle F proj` it will be possible to promote a
`Pretrivialization F proj` to a `Trivialization F proj`. -/
structure Pretrivialization (proj : Z → B) extends PartialEquiv Z (B × F) where
open_target : IsOpen target
baseSet : Set B
open_baseSet : IsOpen baseSet
source_eq : source = proj ⁻¹' baseSet
target_eq : target = baseSet ×ˢ univ
proj_toFun : ∀ p ∈ source, (toFun p).1 = proj p
namespace Pretrivialization
variable {F}
variable (e : Pretrivialization F proj) {x : Z}
/-- Coercion of a pretrivialization to a function. We don't use `e.toFun` in the `CoeFun` instance
because it is actually `e.toPartialEquiv.toFun`, so `simp` will apply lemmas about
`toPartialEquiv`. While we may want to switch to this behavior later, doing it mid-port will break a
lot of proofs. -/
@[coe] def toFun' : Z → (B × F) := e.toFun
instance : CoeFun (Pretrivialization F proj) fun _ => Z → B × F := ⟨toFun'⟩
@[ext]
lemma ext' (e e' : Pretrivialization F proj) (h₁ : e.toPartialEquiv = e'.toPartialEquiv)
(h₂ : e.baseSet = e'.baseSet) : e = e' := by
cases e; cases e'; congr
-- TODO: move `ext` here?
lemma ext {e e' : Pretrivialization F proj} (h₁ : ∀ x, e x = e' x)
(h₂ : ∀ x, e.toPartialEquiv.symm x = e'.toPartialEquiv.symm x) (h₃ : e.baseSet = e'.baseSet) :
e = e' := by
ext1 <;> [ext1; exact h₃]
· apply h₁
· apply h₂
· rw [e.source_eq, e'.source_eq, h₃]
/-- If the fiber is nonempty, then the projection also is. -/
lemma toPartialEquiv_injective [Nonempty F] :
Injective (toPartialEquiv : Pretrivialization F proj → PartialEquiv Z (B × F)) := by
refine fun e e' h ↦ ext' _ _ h ?_
simpa only [fst_image_prod, univ_nonempty, target_eq]
using congr_arg (Prod.fst '' PartialEquiv.target ·) h
@[simp, mfld_simps]
theorem coe_coe : ⇑e.toPartialEquiv = e :=
rfl
@[simp, mfld_simps]
theorem coe_fst (ex : x ∈ e.source) : (e x).1 = proj x :=
e.proj_toFun x ex
theorem mem_source : x ∈ e.source ↔ proj x ∈ e.baseSet := by rw [e.source_eq, mem_preimage]
theorem coe_fst' (ex : proj x ∈ e.baseSet) : (e x).1 = proj x :=
e.coe_fst (e.mem_source.2 ex)
protected theorem eqOn : EqOn (Prod.fst ∘ e) proj e.source := fun _ hx => e.coe_fst hx
theorem mk_proj_snd (ex : x ∈ e.source) : (proj x, (e x).2) = e x :=
Prod.ext (e.coe_fst ex).symm rfl
theorem mk_proj_snd' (ex : proj x ∈ e.baseSet) : (proj x, (e x).2) = e x :=
Prod.ext (e.coe_fst' ex).symm rfl
/-- Composition of inverse and coercion from the subtype of the target. -/
def setSymm : e.target → Z :=
e.target.restrict e.toPartialEquiv.symm
theorem mem_target {x : B × F} : x ∈ e.target ↔ x.1 ∈ e.baseSet := by
rw [e.target_eq, prod_univ, mem_preimage]
theorem proj_symm_apply {x : B × F} (hx : x ∈ e.target) : proj (e.toPartialEquiv.symm x) = x.1 := by
have := (e.coe_fst (e.map_target hx)).symm
rwa [← e.coe_coe, e.right_inv hx] at this
theorem proj_symm_apply' {b : B} {x : F} (hx : b ∈ e.baseSet) :
proj (e.toPartialEquiv.symm (b, x)) = b :=
e.proj_symm_apply (e.mem_target.2 hx)
theorem proj_surjOn_baseSet [Nonempty F] : Set.SurjOn proj e.source e.baseSet := fun b hb =>
let ⟨y⟩ := ‹Nonempty F›
⟨e.toPartialEquiv.symm (b, y), e.toPartialEquiv.map_target <| e.mem_target.2 hb,
e.proj_symm_apply' hb⟩
theorem apply_symm_apply {x : B × F} (hx : x ∈ e.target) : e (e.toPartialEquiv.symm x) = x :=
e.toPartialEquiv.right_inv hx
theorem apply_symm_apply' {b : B} {x : F} (hx : b ∈ e.baseSet) :
e (e.toPartialEquiv.symm (b, x)) = (b, x) :=
e.apply_symm_apply (e.mem_target.2 hx)
theorem symm_apply_apply {x : Z} (hx : x ∈ e.source) : e.toPartialEquiv.symm (e x) = x :=
e.toPartialEquiv.left_inv hx
@[simp, mfld_simps]
theorem symm_apply_mk_proj {x : Z} (ex : x ∈ e.source) :
e.toPartialEquiv.symm (proj x, (e x).2) = x := by
rw [← e.coe_fst ex, ← e.coe_coe, e.left_inv ex]
@[simp, mfld_simps]
theorem preimage_symm_proj_baseSet :
e.toPartialEquiv.symm ⁻¹' (proj ⁻¹' e.baseSet) ∩ e.target = e.target := by
refine inter_eq_right.mpr fun x hx => ?_
simp only [mem_preimage, PartialEquiv.invFun_as_coe, e.proj_symm_apply hx]
exact e.mem_target.mp hx
@[simp, mfld_simps]
theorem preimage_symm_proj_inter (s : Set B) :
e.toPartialEquiv.symm ⁻¹' (proj ⁻¹' s) ∩ e.baseSet ×ˢ univ = (s ∩ e.baseSet) ×ˢ univ := by
ext ⟨x, y⟩
suffices x ∈ e.baseSet → (proj (e.toPartialEquiv.symm (x, y)) ∈ s ↔ x ∈ s) by
simpa only [prodMk_mem_set_prod_eq, mem_inter_iff, and_true, mem_univ, and_congr_left_iff]
intro h
rw [e.proj_symm_apply' h]
theorem target_inter_preimage_symm_source_eq (e f : Pretrivialization F proj) :
f.target ∩ f.toPartialEquiv.symm ⁻¹' e.source = (e.baseSet ∩ f.baseSet) ×ˢ univ := by
rw [inter_comm, f.target_eq, e.source_eq, f.preimage_symm_proj_inter]
theorem trans_source (e f : Pretrivialization F proj) :
(f.toPartialEquiv.symm.trans e.toPartialEquiv).source = (e.baseSet ∩ f.baseSet) ×ˢ univ := by
rw [PartialEquiv.trans_source, PartialEquiv.symm_source, e.target_inter_preimage_symm_source_eq]
theorem symm_trans_symm (e e' : Pretrivialization F proj) :
(e.toPartialEquiv.symm.trans e'.toPartialEquiv).symm
= e'.toPartialEquiv.symm.trans e.toPartialEquiv := by
rw [PartialEquiv.trans_symm_eq_symm_trans_symm, PartialEquiv.symm_symm]
theorem symm_trans_source_eq (e e' : Pretrivialization F proj) :
(e.toPartialEquiv.symm.trans e'.toPartialEquiv).source = (e.baseSet ∩ e'.baseSet) ×ˢ univ := by
rw [PartialEquiv.trans_source, e'.source_eq, PartialEquiv.symm_source, e.target_eq, inter_comm,
e.preimage_symm_proj_inter, inter_comm]
theorem symm_trans_target_eq (e e' : Pretrivialization F proj) :
(e.toPartialEquiv.symm.trans e'.toPartialEquiv).target = (e.baseSet ∩ e'.baseSet) ×ˢ univ := by
rw [← PartialEquiv.symm_source, symm_trans_symm, symm_trans_source_eq, inter_comm]
| variable (e' : Pretrivialization F (π F E)) {b : B} {y : E b}
@[simp]
| Mathlib/Topology/FiberBundle/Trivialization.lean | 198 | 200 |
/-
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, Antoine Labelle
-/
import Mathlib.LinearAlgebra.Contraction
import Mathlib.LinearAlgebra.Matrix.Charpoly.Coeff
import Mathlib.RingTheory.Finiteness.Prod
import Mathlib.RingTheory.TensorProduct.Finite
import Mathlib.RingTheory.TensorProduct.Free
/-!
# Trace of a linear map
This file defines the trace of a linear map.
See also `LinearAlgebra/Matrix/Trace.lean` for the trace of a matrix.
## Tags
linear_map, trace, diagonal
-/
noncomputable section
universe u v w
namespace LinearMap
open scoped Matrix
open Module TensorProduct
section
variable (R : Type u) [CommSemiring R] {M : Type v} [AddCommMonoid M] [Module R M]
variable {ι : Type w} [DecidableEq ι] [Fintype ι]
variable {κ : Type*} [DecidableEq κ] [Fintype κ]
variable (b : Basis ι R M) (c : Basis κ R M)
/-- The trace of an endomorphism given a basis. -/
def traceAux : (M →ₗ[R] M) →ₗ[R] R :=
Matrix.traceLinearMap ι R R ∘ₗ ↑(LinearMap.toMatrix b b)
-- Can't be `simp` because it would cause a loop.
theorem traceAux_def (b : Basis ι R M) (f : M →ₗ[R] M) :
traceAux R b f = Matrix.trace (LinearMap.toMatrix b b f) :=
rfl
theorem traceAux_eq : traceAux R b = traceAux R c :=
LinearMap.ext fun f =>
calc
Matrix.trace (LinearMap.toMatrix b b f) =
Matrix.trace (LinearMap.toMatrix b b ((LinearMap.id.comp f).comp LinearMap.id)) := by
rw [LinearMap.id_comp, LinearMap.comp_id]
| _ = Matrix.trace (LinearMap.toMatrix c b LinearMap.id * LinearMap.toMatrix c c f *
LinearMap.toMatrix b c LinearMap.id) := by
rw [LinearMap.toMatrix_comp _ c, LinearMap.toMatrix_comp _ c]
_ = Matrix.trace (LinearMap.toMatrix c c f * LinearMap.toMatrix b c LinearMap.id *
LinearMap.toMatrix c b LinearMap.id) := by
rw [Matrix.mul_assoc, Matrix.trace_mul_comm]
_ = Matrix.trace (LinearMap.toMatrix c c ((f.comp LinearMap.id).comp LinearMap.id)) := by
rw [LinearMap.toMatrix_comp _ b, LinearMap.toMatrix_comp _ c]
_ = Matrix.trace (LinearMap.toMatrix c c f) := by rw [LinearMap.comp_id, LinearMap.comp_id]
variable (M) in
open Classical in
/-- Trace of an endomorphism independent of basis. -/
def trace : (M →ₗ[R] M) →ₗ[R] R :=
if H : ∃ s : Finset M, Nonempty (Basis s R M) then traceAux R H.choose_spec.some else 0
| Mathlib/LinearAlgebra/Trace.lean | 55 | 69 |
/-
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.Polynomial.Degree.Domain
import Mathlib.Algebra.Polynomial.Degree.Support
import Mathlib.Algebra.Polynomial.Eval.Coeff
import Mathlib.GroupTheory.GroupAction.Ring
/-!
# The derivative map on polynomials
## Main definitions
* `Polynomial.derivative`: The formal derivative of polynomials, expressed as a linear map.
* `Polynomial.derivativeFinsupp`: Iterated derivatives as a finite support function.
-/
noncomputable section
open Finset
open Polynomial
open scoped Nat
namespace Polynomial
universe u v w y z
variable {R : Type u} {S : Type v} {T : Type w} {ι : Type y} {A : Type z} {a b : R} {n : ℕ}
section Derivative
section Semiring
variable [Semiring R]
/-- `derivative p` is the formal derivative of the polynomial `p` -/
def derivative : R[X] →ₗ[R] R[X] where
toFun p := p.sum fun n a => C (a * n) * X ^ (n - 1)
map_add' p q := by
rw [sum_add_index] <;>
simp only [add_mul, forall_const, RingHom.map_add, eq_self_iff_true, zero_mul,
RingHom.map_zero]
map_smul' a p := by
dsimp; rw [sum_smul_index] <;>
simp only [mul_sum, ← C_mul', mul_assoc, coeff_C_mul, RingHom.map_mul, forall_const, zero_mul,
RingHom.map_zero, sum]
theorem derivative_apply (p : R[X]) : derivative p = p.sum fun n a => C (a * n) * X ^ (n - 1) :=
rfl
theorem coeff_derivative (p : R[X]) (n : ℕ) :
coeff (derivative p) n = coeff p (n + 1) * (n + 1) := by
rw [derivative_apply]
simp only [coeff_X_pow, coeff_sum, coeff_C_mul]
rw [sum, Finset.sum_eq_single (n + 1)]
· simp only [Nat.add_succ_sub_one, add_zero, mul_one, if_true, eq_self_iff_true]; norm_cast
· intro b
cases b
· intros
rw [Nat.cast_zero, mul_zero, zero_mul]
· intro _ H
rw [Nat.add_one_sub_one, if_neg (mt (congr_arg Nat.succ) H.symm), mul_zero]
· rw [if_pos (add_tsub_cancel_right n 1).symm, mul_one, Nat.cast_add, Nat.cast_one,
mem_support_iff]
intro h
push_neg at h
simp [h]
@[simp]
theorem derivative_zero : derivative (0 : R[X]) = 0 :=
derivative.map_zero
theorem iterate_derivative_zero {k : ℕ} : derivative^[k] (0 : R[X]) = 0 :=
iterate_map_zero derivative k
theorem derivative_monomial (a : R) (n : ℕ) :
derivative (monomial n a) = monomial (n - 1) (a * n) := by
rw [derivative_apply, sum_monomial_index, C_mul_X_pow_eq_monomial]
simp
@[simp]
theorem derivative_monomial_succ (a : R) (n : ℕ) :
derivative (monomial (n + 1) a) = monomial n (a * (n + 1)) := by
rw [derivative_monomial, add_tsub_cancel_right, Nat.cast_add, Nat.cast_one]
theorem derivative_C_mul_X (a : R) : derivative (C a * X) = C a := by
simp [C_mul_X_eq_monomial, derivative_monomial, Nat.cast_one, mul_one]
theorem derivative_C_mul_X_pow (a : R) (n : ℕ) :
derivative (C a * X ^ n) = C (a * n) * X ^ (n - 1) := by
rw [C_mul_X_pow_eq_monomial, C_mul_X_pow_eq_monomial, derivative_monomial]
theorem derivative_C_mul_X_sq (a : R) : derivative (C a * X ^ 2) = C (a * 2) * X := by
rw [derivative_C_mul_X_pow, Nat.cast_two, pow_one]
theorem derivative_X_pow (n : ℕ) : derivative (X ^ n : R[X]) = C (n : R) * X ^ (n - 1) := by
convert derivative_C_mul_X_pow (1 : R) n <;> simp
@[simp]
theorem derivative_X_pow_succ (n : ℕ) :
derivative (X ^ (n + 1) : R[X]) = C (n + 1 : R) * X ^ n := by
simp [derivative_X_pow]
theorem derivative_X_sq : derivative (X ^ 2 : R[X]) = C 2 * X := by
rw [derivative_X_pow, Nat.cast_two, pow_one]
@[simp]
theorem derivative_C {a : R} : derivative (C a) = 0 := by simp [derivative_apply]
theorem derivative_of_natDegree_zero {p : R[X]} (hp : p.natDegree = 0) : derivative p = 0 := by
rw [eq_C_of_natDegree_eq_zero hp, derivative_C]
@[simp]
theorem derivative_X : derivative (X : R[X]) = 1 :=
(derivative_monomial _ _).trans <| by simp
@[simp]
theorem derivative_one : derivative (1 : R[X]) = 0 :=
derivative_C
@[simp]
theorem derivative_add {f g : R[X]} : derivative (f + g) = derivative f + derivative g :=
derivative.map_add f g
theorem derivative_X_add_C (c : R) : derivative (X + C c) = 1 := by
rw [derivative_add, derivative_X, derivative_C, add_zero]
theorem derivative_sum {s : Finset ι} {f : ι → R[X]} :
derivative (∑ b ∈ s, f b) = ∑ b ∈ s, derivative (f b) :=
map_sum ..
theorem iterate_derivative_sum (k : ℕ) (s : Finset ι) (f : ι → R[X]) :
derivative^[k] (∑ b ∈ s, f b) = ∑ b ∈ s, derivative^[k] (f b) := by
simp_rw [← Module.End.pow_apply, map_sum]
theorem derivative_smul {S : Type*} [SMulZeroClass S R] [IsScalarTower S R R] (s : S)
(p : R[X]) : derivative (s • p) = s • derivative p :=
derivative.map_smul_of_tower s p
@[simp]
theorem iterate_derivative_smul {S : Type*} [SMulZeroClass S R] [IsScalarTower S R R]
(s : S) (p : R[X]) (k : ℕ) : derivative^[k] (s • p) = s • derivative^[k] p := by
induction k generalizing p with
| zero => simp
| succ k ih => simp [ih]
@[simp]
theorem iterate_derivative_C_mul (a : R) (p : R[X]) (k : ℕ) :
derivative^[k] (C a * p) = C a * derivative^[k] p := by
simp_rw [← smul_eq_C_mul, iterate_derivative_smul]
theorem derivative_C_mul (a : R) (p : R[X]) :
derivative (C a * p) = C a * derivative p := iterate_derivative_C_mul _ _ 1
theorem of_mem_support_derivative {p : R[X]} {n : ℕ} (h : n ∈ p.derivative.support) :
n + 1 ∈ p.support :=
mem_support_iff.2 fun h1 : p.coeff (n + 1) = 0 =>
mem_support_iff.1 h <| show p.derivative.coeff n = 0 by rw [coeff_derivative, h1, zero_mul]
theorem degree_derivative_lt {p : R[X]} (hp : p ≠ 0) : p.derivative.degree < p.degree :=
(Finset.sup_lt_iff <| bot_lt_iff_ne_bot.2 <| mt degree_eq_bot.1 hp).2 fun n hp =>
lt_of_lt_of_le (WithBot.coe_lt_coe.2 n.lt_succ_self) <|
Finset.le_sup <| of_mem_support_derivative hp
theorem degree_derivative_le {p : R[X]} : p.derivative.degree ≤ p.degree :=
letI := Classical.decEq R
if H : p = 0 then le_of_eq <| by rw [H, derivative_zero] else (degree_derivative_lt H).le
theorem natDegree_derivative_lt {p : R[X]} (hp : p.natDegree ≠ 0) :
p.derivative.natDegree < p.natDegree := by
rcases eq_or_ne (derivative p) 0 with hp' | hp'
· rw [hp', Polynomial.natDegree_zero]
exact hp.bot_lt
· rw [natDegree_lt_natDegree_iff hp']
exact degree_derivative_lt fun h => hp (h.symm ▸ natDegree_zero)
theorem natDegree_derivative_le (p : R[X]) : p.derivative.natDegree ≤ p.natDegree - 1 := by
by_cases p0 : p.natDegree = 0
· simp [p0, derivative_of_natDegree_zero]
· exact Nat.le_sub_one_of_lt (natDegree_derivative_lt p0)
theorem natDegree_iterate_derivative (p : R[X]) (k : ℕ) :
(derivative^[k] p).natDegree ≤ p.natDegree - k := by
induction k with
| zero => rw [Function.iterate_zero_apply, Nat.sub_zero]
| succ d hd =>
rw [Function.iterate_succ_apply', Nat.sub_succ']
exact (natDegree_derivative_le _).trans <| Nat.sub_le_sub_right hd 1
@[simp]
theorem derivative_natCast {n : ℕ} : derivative (n : R[X]) = 0 := by
rw [← map_natCast C n]
exact derivative_C
@[simp]
theorem derivative_ofNat (n : ℕ) [n.AtLeastTwo] :
derivative (ofNat(n) : R[X]) = 0 :=
derivative_natCast
theorem iterate_derivative_eq_zero {p : R[X]} {x : ℕ} (hx : p.natDegree < x) :
Polynomial.derivative^[x] p = 0 := by
induction' h : p.natDegree using Nat.strong_induction_on with _ ih generalizing p x
subst h
obtain ⟨t, rfl⟩ := Nat.exists_eq_succ_of_ne_zero (pos_of_gt hx).ne'
rw [Function.iterate_succ_apply]
by_cases hp : p.natDegree = 0
· rw [derivative_of_natDegree_zero hp, iterate_derivative_zero]
have := natDegree_derivative_lt hp
exact ih _ this (this.trans_le <| Nat.le_of_lt_succ hx) rfl
@[simp]
theorem iterate_derivative_C {k} (h : 0 < k) : derivative^[k] (C a : R[X]) = 0 :=
iterate_derivative_eq_zero <| (natDegree_C _).trans_lt h
@[simp]
theorem iterate_derivative_one {k} (h : 0 < k) : derivative^[k] (1 : R[X]) = 0 :=
iterate_derivative_C h
@[simp]
theorem iterate_derivative_X {k} (h : 1 < k) : derivative^[k] (X : R[X]) = 0 :=
iterate_derivative_eq_zero <| natDegree_X_le.trans_lt h
theorem natDegree_eq_zero_of_derivative_eq_zero [NoZeroSMulDivisors ℕ R] {f : R[X]}
(h : derivative f = 0) : f.natDegree = 0 := by
rcases eq_or_ne f 0 with (rfl | hf)
· exact natDegree_zero
rw [natDegree_eq_zero_iff_degree_le_zero]
by_contra! f_nat_degree_pos
rw [← natDegree_pos_iff_degree_pos] at f_nat_degree_pos
let m := f.natDegree - 1
have hm : m + 1 = f.natDegree := tsub_add_cancel_of_le f_nat_degree_pos
have h2 := coeff_derivative f m
rw [Polynomial.ext_iff] at h
rw [h m, coeff_zero, ← Nat.cast_add_one, ← nsmul_eq_mul', eq_comm, smul_eq_zero] at h2
replace h2 := h2.resolve_left m.succ_ne_zero
rw [hm, ← leadingCoeff, leadingCoeff_eq_zero] at h2
exact hf h2
theorem eq_C_of_derivative_eq_zero [NoZeroSMulDivisors ℕ R] {f : R[X]} (h : derivative f = 0) :
f = C (f.coeff 0) :=
eq_C_of_natDegree_eq_zero <| natDegree_eq_zero_of_derivative_eq_zero h
@[simp]
theorem derivative_mul {f g : R[X]} : derivative (f * g) = derivative f * g + f * derivative g := by
induction f using Polynomial.induction_on' with
| add => simp only [add_mul, map_add, add_assoc, add_left_comm, *]
| monomial m a => ?_
induction g using Polynomial.induction_on' with
| add => simp only [mul_add, map_add, add_assoc, add_left_comm, *]
| monomial n b => ?_
simp only [monomial_mul_monomial, derivative_monomial]
simp only [mul_assoc, (Nat.cast_commute _ _).eq, Nat.cast_add, mul_add, map_add]
cases m with
| zero => simp only [zero_add, Nat.cast_zero, mul_zero, map_zero]
| succ m =>
cases n with
| zero => simp only [add_zero, Nat.cast_zero, mul_zero, map_zero]
| succ n =>
simp only [Nat.add_succ_sub_one, add_tsub_cancel_right]
rw [add_assoc, add_comm n 1]
theorem derivative_eval (p : R[X]) (x : R) :
p.derivative.eval x = p.sum fun n a => a * n * x ^ (n - 1) := by
simp_rw [derivative_apply, eval_sum, eval_mul_X_pow, eval_C]
@[simp]
theorem derivative_map [Semiring S] (p : R[X]) (f : R →+* S) :
derivative (p.map f) = p.derivative.map f := by
let n := max p.natDegree (map f p).natDegree
rw [derivative_apply, derivative_apply]
rw [sum_over_range' _ _ (n + 1) ((le_max_left _ _).trans_lt (lt_add_one _))]
on_goal 1 => rw [sum_over_range' _ _ (n + 1) ((le_max_right _ _).trans_lt (lt_add_one _))]
· simp only [Polynomial.map_sum, Polynomial.map_mul, Polynomial.map_C, map_mul, coeff_map,
map_natCast, Polynomial.map_natCast, Polynomial.map_pow, map_X]
all_goals intro n; rw [zero_mul, C_0, zero_mul]
@[simp]
theorem iterate_derivative_map [Semiring S] (p : R[X]) (f : R →+* S) (k : ℕ) :
Polynomial.derivative^[k] (p.map f) = (Polynomial.derivative^[k] p).map f := by
induction' k with k ih generalizing p
· simp
· simp only [ih, Function.iterate_succ, Polynomial.derivative_map, Function.comp_apply]
theorem derivative_natCast_mul {n : ℕ} {f : R[X]} :
derivative ((n : R[X]) * f) = n * derivative f := by
simp
@[simp]
theorem iterate_derivative_natCast_mul {n k : ℕ} {f : R[X]} :
derivative^[k] ((n : R[X]) * f) = n * derivative^[k] f := by
induction' k with k ih generalizing f <;> simp [*]
theorem mem_support_derivative [NoZeroSMulDivisors ℕ R] (p : R[X]) (n : ℕ) :
n ∈ (derivative p).support ↔ n + 1 ∈ p.support := by
suffices ¬p.coeff (n + 1) * (n + 1 : ℕ) = 0 ↔ coeff p (n + 1) ≠ 0 by
simpa only [mem_support_iff, coeff_derivative, Ne, Nat.cast_succ]
rw [← nsmul_eq_mul', smul_eq_zero]
simp only [Nat.succ_ne_zero, false_or]
@[simp]
theorem degree_derivative_eq [NoZeroSMulDivisors ℕ R] (p : R[X]) (hp : 0 < natDegree p) :
degree (derivative p) = (natDegree p - 1 : ℕ) := by
apply le_antisymm
· rw [derivative_apply]
apply le_trans (degree_sum_le _ _) (Finset.sup_le _)
intro n hn
apply le_trans (degree_C_mul_X_pow_le _ _) (WithBot.coe_le_coe.2 (tsub_le_tsub_right _ _))
apply le_natDegree_of_mem_supp _ hn
· refine le_sup ?_
rw [mem_support_derivative, tsub_add_cancel_of_le, mem_support_iff]
· rw [coeff_natDegree, Ne, leadingCoeff_eq_zero]
intro h
rw [h, natDegree_zero] at hp
exact hp.false
exact hp
theorem coeff_iterate_derivative {k} (p : R[X]) (m : ℕ) :
(derivative^[k] p).coeff m = (m + k).descFactorial k • p.coeff (m + k) := by
induction k generalizing m with
| zero => simp
| succ k ih =>
calc
(derivative^[k + 1] p).coeff m
_ = Nat.descFactorial (Nat.succ (m + k)) k • p.coeff (m + k.succ) * (m + 1) := by
rw [Function.iterate_succ_apply', coeff_derivative, ih m.succ, Nat.succ_add, Nat.add_succ]
_ = ((m + 1) * Nat.descFactorial (Nat.succ (m + k)) k) • p.coeff (m + k.succ) := by
rw [← Nat.cast_add_one, ← nsmul_eq_mul', smul_smul]
_ = Nat.descFactorial (m.succ + k) k.succ • p.coeff (m + k.succ) := by
rw [← Nat.succ_add, Nat.descFactorial_succ, add_tsub_cancel_right]
_ = Nat.descFactorial (m + k.succ) k.succ • p.coeff (m + k.succ) := by
rw [Nat.succ_add_eq_add_succ]
theorem iterate_derivative_eq_sum (p : R[X]) (k : ℕ) :
derivative^[k] p =
∑ x ∈ (derivative^[k] p).support, C ((x + k).descFactorial k • p.coeff (x + k)) * X ^ x := by
conv_lhs => rw [(derivative^[k] p).as_sum_support_C_mul_X_pow]
refine sum_congr rfl fun i _ ↦ ?_
rw [coeff_iterate_derivative, Nat.descFactorial_eq_factorial_mul_choose]
theorem iterate_derivative_eq_factorial_smul_sum (p : R[X]) (k : ℕ) :
derivative^[k] p = k ! •
∑ x ∈ (derivative^[k] p).support, C ((x + k).choose k • p.coeff (x + k)) * X ^ x := by
conv_lhs => rw [iterate_derivative_eq_sum]
rw [smul_sum]
refine sum_congr rfl fun i _ ↦ ?_
rw [← smul_mul_assoc, smul_C, smul_smul, Nat.descFactorial_eq_factorial_mul_choose]
theorem iterate_derivative_mul {n} (p q : R[X]) :
derivative^[n] (p * q) =
∑ k ∈ range n.succ, (n.choose k • (derivative^[n - k] p * derivative^[k] q)) := by
induction n with
| zero =>
simp [Finset.range]
| succ n IH =>
calc
derivative^[n + 1] (p * q) =
derivative (∑ k ∈ range n.succ,
n.choose k • (derivative^[n - k] p * derivative^[k] q)) := by
rw [Function.iterate_succ_apply', IH]
_ = (∑ k ∈ range n.succ,
n.choose k • (derivative^[n - k + 1] p * derivative^[k] q)) +
∑ k ∈ range n.succ,
n.choose k • (derivative^[n - k] p * derivative^[k + 1] q) := by
simp_rw [derivative_sum, derivative_smul, derivative_mul, Function.iterate_succ_apply',
smul_add, sum_add_distrib]
_ = (∑ k ∈ range n.succ,
n.choose k.succ • (derivative^[n - k] p * derivative^[k + 1] q)) +
1 • (derivative^[n + 1] p * derivative^[0] q) +
∑ k ∈ range n.succ, n.choose k • (derivative^[n - k] p * derivative^[k + 1] q) :=
?_
_ = ((∑ k ∈ range n.succ, n.choose k • (derivative^[n - k] p * derivative^[k + 1] q)) +
∑ k ∈ range n.succ,
n.choose k.succ • (derivative^[n - k] p * derivative^[k + 1] q)) +
1 • (derivative^[n + 1] p * derivative^[0] q) := by
rw [add_comm, add_assoc]
_ = (∑ i ∈ range n.succ,
(n + 1).choose (i + 1) • (derivative^[n + 1 - (i + 1)] p * derivative^[i + 1] q)) +
1 • (derivative^[n + 1] p * derivative^[0] q) := by
simp_rw [Nat.choose_succ_succ, Nat.succ_sub_succ, add_smul, sum_add_distrib]
_ = ∑ k ∈ range n.succ.succ,
n.succ.choose k • (derivative^[n.succ - k] p * derivative^[k] q) := by
rw [sum_range_succ' _ n.succ, Nat.choose_zero_right, tsub_zero]
congr
refine (sum_range_succ' _ _).trans (congr_arg₂ (· + ·) ?_ ?_)
· rw [sum_range_succ, Nat.choose_succ_self, zero_smul, add_zero]
refine sum_congr rfl fun k hk => ?_
rw [mem_range] at hk
congr
omega
· rw [Nat.choose_zero_right, tsub_zero]
/--
Iterated derivatives as a finite support function.
-/
@[simps! apply_toFun]
noncomputable def derivativeFinsupp : R[X] →ₗ[R] ℕ →₀ R[X] where
toFun p := .onFinset (range (p.natDegree + 1)) (derivative^[·] p) fun i ↦ by
contrapose; simp_all [iterate_derivative_eq_zero, Nat.succ_le]
map_add' _ _ := by ext; simp
map_smul' _ _ := by ext; simp
@[simp]
theorem support_derivativeFinsupp_subset_range {p : R[X]} {n : ℕ} (h : p.natDegree < n) :
(derivativeFinsupp p).support ⊆ range n := by
dsimp [derivativeFinsupp]
exact Finsupp.support_onFinset_subset.trans (Finset.range_subset.mpr h)
@[simp]
theorem derivativeFinsupp_C (r : R) : derivativeFinsupp (C r : R[X]) = .single 0 (C r) := by
ext i : 1
match i with
| 0 => simp
| i + 1 => simp
@[simp]
theorem derivativeFinsupp_one : derivativeFinsupp (1 : R[X]) = .single 0 1 := by
simpa using derivativeFinsupp_C (1 : R)
@[simp]
theorem derivativeFinsupp_X : derivativeFinsupp (X : R[X]) = .single 0 X + .single 1 1 := by
ext i : 1
match i with
| 0 => simp
| 1 => simp
| (n + 2) => simp
theorem derivativeFinsupp_map [Semiring S] (p : R[X]) (f : R →+* S) :
derivativeFinsupp (p.map f) = (derivativeFinsupp p).mapRange (·.map f) (by simp) := by
ext i : 1
simp
theorem derivativeFinsupp_derivative (p : R[X]) :
derivativeFinsupp (derivative p) =
(derivativeFinsupp p).comapDomain Nat.succ Nat.succ_injective.injOn := by
ext i : 1
simp
end Semiring
section CommSemiring
variable [CommSemiring R]
theorem derivative_pow_succ (p : R[X]) (n : ℕ) :
derivative (p ^ (n + 1)) = C (n + 1 : R) * p ^ n * derivative p :=
Nat.recOn n (by simp) fun n ih => by
rw [pow_succ, derivative_mul, ih, Nat.add_one, mul_right_comm, C_add,
add_mul, add_mul, pow_succ, ← mul_assoc, C_1, one_mul]; simp [add_mul]
theorem derivative_pow (p : R[X]) (n : ℕ) :
derivative (p ^ n) = C (n : R) * p ^ (n - 1) * derivative p :=
Nat.casesOn n (by rw [pow_zero, derivative_one, Nat.cast_zero, C_0, zero_mul, zero_mul]) fun n =>
by rw [p.derivative_pow_succ n, Nat.add_one_sub_one, n.cast_succ]
theorem derivative_sq (p : R[X]) : derivative (p ^ 2) = C 2 * p * derivative p := by
rw [derivative_pow_succ, Nat.cast_one, one_add_one_eq_two, pow_one]
theorem pow_sub_one_dvd_derivative_of_pow_dvd {p q : R[X]} {n : ℕ}
(dvd : q ^ n ∣ p) : q ^ (n - 1) ∣ derivative p := by
obtain ⟨r, rfl⟩ := dvd
rw [derivative_mul, derivative_pow]
exact (((dvd_mul_left _ _).mul_right _).mul_right _).add ((pow_dvd_pow q n.pred_le).mul_right _)
theorem pow_sub_dvd_iterate_derivative_of_pow_dvd {p q : R[X]} {n : ℕ} (m : ℕ)
(dvd : q ^ n ∣ p) : q ^ (n - m) ∣ derivative^[m] p := by
induction m generalizing p with
| zero => simpa
| succ m ih =>
rw [Nat.sub_succ, Function.iterate_succ']
exact pow_sub_one_dvd_derivative_of_pow_dvd (ih dvd)
theorem pow_sub_dvd_iterate_derivative_pow (p : R[X]) (n m : ℕ) :
p ^ (n - m) ∣ derivative^[m] (p ^ n) := pow_sub_dvd_iterate_derivative_of_pow_dvd m dvd_rfl
theorem dvd_iterate_derivative_pow (f : R[X]) (n : ℕ) {m : ℕ} (c : R) (hm : m ≠ 0) :
(n : R) ∣ eval c (derivative^[m] (f ^ n)) := by
obtain ⟨m, rfl⟩ := Nat.exists_eq_succ_of_ne_zero hm
rw [Function.iterate_succ_apply, derivative_pow, mul_assoc, C_eq_natCast,
iterate_derivative_natCast_mul, eval_mul, eval_natCast]
exact dvd_mul_right _ _
theorem iterate_derivative_X_pow_eq_natCast_mul (n k : ℕ) :
derivative^[k] (X ^ n : R[X]) = ↑(Nat.descFactorial n k : R[X]) * X ^ (n - k) := by
induction k with
| zero =>
rw [Function.iterate_zero_apply, tsub_zero, Nat.descFactorial_zero, Nat.cast_one, one_mul]
| succ k ih =>
rw [Function.iterate_succ_apply', ih, derivative_natCast_mul, derivative_X_pow, C_eq_natCast,
Nat.descFactorial_succ, Nat.sub_sub, Nat.cast_mul]
simp [mul_comm, mul_assoc, mul_left_comm]
theorem iterate_derivative_X_pow_eq_C_mul (n k : ℕ) :
derivative^[k] (X ^ n : R[X]) = C (Nat.descFactorial n k : R) * X ^ (n - k) := by
rw [iterate_derivative_X_pow_eq_natCast_mul n k, C_eq_natCast]
theorem iterate_derivative_X_pow_eq_smul (n : ℕ) (k : ℕ) :
derivative^[k] (X ^ n : R[X]) = (Nat.descFactorial n k : R) • X ^ (n - k) := by
rw [iterate_derivative_X_pow_eq_C_mul n k, smul_eq_C_mul]
theorem derivative_X_add_C_pow (c : R) (m : ℕ) :
derivative ((X + C c) ^ m) = C (m : R) * (X + C c) ^ (m - 1) := by
rw [derivative_pow, derivative_X_add_C, mul_one]
theorem derivative_X_add_C_sq (c : R) : derivative ((X + C c) ^ 2) = C 2 * (X + C c) := by
rw [derivative_sq, derivative_X_add_C, mul_one]
theorem iterate_derivative_X_add_pow (n k : ℕ) (c : R) :
derivative^[k] ((X + C c) ^ n) = Nat.descFactorial n k • (X + C c) ^ (n - k) := by
induction k with
| zero => simp
| succ k IH =>
rw [Nat.sub_succ', Function.iterate_succ_apply', IH, derivative_smul,
derivative_X_add_C_pow, map_natCast, Nat.descFactorial_succ, nsmul_eq_mul, nsmul_eq_mul,
Nat.cast_mul]
ring
theorem derivative_comp (p q : R[X]) :
derivative (p.comp q) = derivative q * p.derivative.comp q := by
induction p using Polynomial.induction_on'
· simp [*, mul_add]
· simp only [derivative_pow, derivative_mul, monomial_comp, derivative_monomial, derivative_C,
zero_mul, C_eq_natCast, zero_add, RingHom.map_mul]
ring
/-- Chain rule for formal derivative of polynomials. -/
theorem derivative_eval₂_C (p q : R[X]) :
derivative (p.eval₂ C q) = p.derivative.eval₂ C q * derivative q :=
Polynomial.induction_on p (fun r => by rw [eval₂_C, derivative_C, eval₂_zero, zero_mul])
(fun p₁ p₂ ih₁ ih₂ => by
rw [eval₂_add, derivative_add, ih₁, ih₂, derivative_add, eval₂_add, add_mul])
fun n r ih => by
rw [pow_succ, ← mul_assoc, eval₂_mul, eval₂_X, derivative_mul, ih, @derivative_mul _ _ _ X,
derivative_X, mul_one, eval₂_add, @eval₂_mul _ _ _ _ X, eval₂_X, add_mul, mul_right_comm]
theorem derivative_prod [DecidableEq ι] {s : Multiset ι} {f : ι → R[X]} :
derivative (Multiset.map f s).prod =
(Multiset.map (fun i => (Multiset.map f (s.erase i)).prod * derivative (f i)) s).sum := by
refine Multiset.induction_on s (by simp) fun i s h => ?_
rw [Multiset.map_cons, Multiset.prod_cons, derivative_mul, Multiset.map_cons _ i s,
Multiset.sum_cons, Multiset.erase_cons_head, mul_comm (derivative (f i))]
congr
rw [h, ← AddMonoidHom.coe_mulLeft, (AddMonoidHom.mulLeft (f i)).map_multiset_sum _,
AddMonoidHom.coe_mulLeft]
simp only [Function.comp_apply, Multiset.map_map]
refine congr_arg _ (Multiset.map_congr rfl fun j hj => ?_)
rw [← mul_assoc, ← Multiset.prod_cons, ← Multiset.map_cons]
by_cases hij : i = j
· simp [hij, ← Multiset.prod_cons, ← Multiset.map_cons, Multiset.cons_erase hj]
· simp [hij]
end CommSemiring
section Ring
variable [Ring R]
@[simp]
theorem derivative_neg (f : R[X]) : derivative (-f) = -derivative f :=
LinearMap.map_neg derivative f
theorem iterate_derivative_neg {f : R[X]} {k : ℕ} : derivative^[k] (-f) = -derivative^[k] f :=
iterate_map_neg derivative k f
@[simp]
theorem derivative_sub {f g : R[X]} : derivative (f - g) = derivative f - derivative g :=
LinearMap.map_sub derivative f g
theorem derivative_X_sub_C (c : R) : derivative (X - C c) = 1 := by
rw [derivative_sub, derivative_X, derivative_C, sub_zero]
theorem iterate_derivative_sub {k : ℕ} {f g : R[X]} :
derivative^[k] (f - g) = derivative^[k] f - derivative^[k] g :=
iterate_map_sub derivative k f g
@[simp]
theorem derivative_intCast {n : ℤ} : derivative (n : R[X]) = 0 := by
rw [← C_eq_intCast n]
exact derivative_C
theorem derivative_intCast_mul {n : ℤ} {f : R[X]} : derivative ((n : R[X]) * f) =
n * derivative f := by
simp
@[simp]
theorem iterate_derivative_intCast_mul {n : ℤ} {k : ℕ} {f : R[X]} :
derivative^[k] ((n : R[X]) * f) = n * derivative^[k] f := by
| induction' k with k ih generalizing f <;> simp [*]
| Mathlib/Algebra/Polynomial/Derivative.lean | 592 | 593 |
/-
Copyright (c) 2023 Rémy Degenne. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Lorenzo Luccioli, Rémy Degenne, Alexander Bentkamp
-/
import Mathlib.Analysis.SpecialFunctions.Gaussian.FourierTransform
import Mathlib.Probability.Moments.ComplexMGF
/-!
# Gaussian distributions over ℝ
We define a Gaussian measure over the reals.
## Main definitions
* `gaussianPDFReal`: the function `μ v x ↦ (1 / (sqrt (2 * pi * v))) * exp (- (x - μ)^2 / (2 * v))`,
which is the probability density function of a Gaussian distribution with mean `μ` and
variance `v` (when `v ≠ 0`).
* `gaussianPDF`: `ℝ≥0∞`-valued pdf, `gaussianPDF μ v x = ENNReal.ofReal (gaussianPDFReal μ v x)`.
* `gaussianReal`: a Gaussian measure on `ℝ`, parametrized by its mean `μ` and variance `v`.
If `v = 0`, this is `dirac μ`, otherwise it is defined as the measure with density
`gaussianPDF μ v` with respect to the Lebesgue measure.
## Main results
* `gaussianReal_add_const`: if `X` is a random variable with Gaussian distribution with mean `μ` and
variance `v`, then `X + y` is Gaussian with mean `μ + y` and variance `v`.
* `gaussianReal_const_mul`: if `X` is a random variable with Gaussian distribution with mean `μ` and
variance `v`, then `c * X` is Gaussian with mean `c * μ` and variance `c^2 * v`.
-/
open scoped ENNReal NNReal Real Complex
open MeasureTheory
namespace ProbabilityTheory
section GaussianPDF
/-- Probability density function of the gaussian distribution with mean `μ` and variance `v`. -/
noncomputable
def gaussianPDFReal (μ : ℝ) (v : ℝ≥0) (x : ℝ) : ℝ :=
(√(2 * π * v))⁻¹ * rexp (- (x - μ)^2 / (2 * v))
lemma gaussianPDFReal_def (μ : ℝ) (v : ℝ≥0) :
gaussianPDFReal μ v =
fun x ↦ (Real.sqrt (2 * π * v))⁻¹ * rexp (- (x - μ)^2 / (2 * v)) := rfl
@[simp]
lemma gaussianPDFReal_zero_var (m : ℝ) : gaussianPDFReal m 0 = 0 := by
ext1 x
simp [gaussianPDFReal]
/-- The gaussian pdf is positive when the variance is not zero. -/
lemma gaussianPDFReal_pos (μ : ℝ) (v : ℝ≥0) (x : ℝ) (hv : v ≠ 0) : 0 < gaussianPDFReal μ v x := by
rw [gaussianPDFReal]
positivity
/-- The gaussian pdf is nonnegative. -/
lemma gaussianPDFReal_nonneg (μ : ℝ) (v : ℝ≥0) (x : ℝ) : 0 ≤ gaussianPDFReal μ v x := by
rw [gaussianPDFReal]
positivity
/-- The gaussian pdf is measurable. -/
lemma measurable_gaussianPDFReal (μ : ℝ) (v : ℝ≥0) : Measurable (gaussianPDFReal μ v) :=
(((measurable_id.add_const _).pow_const _).neg.div_const _).exp.const_mul _
/-- The gaussian pdf is strongly measurable. -/
lemma stronglyMeasurable_gaussianPDFReal (μ : ℝ) (v : ℝ≥0) :
StronglyMeasurable (gaussianPDFReal μ v) :=
(measurable_gaussianPDFReal μ v).stronglyMeasurable
@[fun_prop]
lemma integrable_gaussianPDFReal (μ : ℝ) (v : ℝ≥0) :
Integrable (gaussianPDFReal μ v) := by
rw [gaussianPDFReal_def]
by_cases hv : v = 0
· simp [hv]
let g : ℝ → ℝ := fun x ↦ (√(2 * π * v))⁻¹ * rexp (- x ^ 2 / (2 * v))
have hg : Integrable g := by
suffices g = fun x ↦ (√(2 * π * v))⁻¹ * rexp (- (2 * v)⁻¹ * x ^ 2) by
rw [this]
refine (integrable_exp_neg_mul_sq ?_).const_mul (√(2 * π * v))⁻¹
simp [lt_of_le_of_ne (zero_le _) (Ne.symm hv)]
ext x
simp only [g, zero_lt_two, mul_nonneg_iff_of_pos_left, NNReal.zero_le_coe, Real.sqrt_mul',
mul_inv_rev, NNReal.coe_mul, NNReal.coe_inv, NNReal.coe_ofNat, neg_mul, mul_eq_mul_left_iff,
Real.exp_eq_exp, mul_eq_zero, inv_eq_zero, Real.sqrt_eq_zero, NNReal.coe_eq_zero, hv,
false_or]
rw [mul_comm]
left
field_simp
exact Integrable.comp_sub_right hg μ
/-- The gaussian distribution pdf integrates to 1 when the variance is not zero. -/
lemma lintegral_gaussianPDFReal_eq_one (μ : ℝ) {v : ℝ≥0} (h : v ≠ 0) :
∫⁻ x, ENNReal.ofReal (gaussianPDFReal μ v x) = 1 := by
rw [← ENNReal.toReal_eq_one_iff]
have hfm : AEStronglyMeasurable (gaussianPDFReal μ v) volume :=
(stronglyMeasurable_gaussianPDFReal μ v).aestronglyMeasurable
have hf : 0 ≤ₐₛ gaussianPDFReal μ v := ae_of_all _ (gaussianPDFReal_nonneg μ v)
rw [← integral_eq_lintegral_of_nonneg_ae hf hfm]
simp only [gaussianPDFReal, zero_lt_two, mul_nonneg_iff_of_pos_right, one_div,
Nat.cast_ofNat, integral_const_mul]
rw [integral_sub_right_eq_self (μ := volume) (fun a ↦ rexp (-a ^ 2 / ((2 : ℝ) * v))) μ]
simp only [zero_lt_two, mul_nonneg_iff_of_pos_right, div_eq_inv_mul, mul_inv_rev,
mul_neg]
simp_rw [← neg_mul]
rw [neg_mul, integral_gaussian, ← Real.sqrt_inv, ← Real.sqrt_mul]
· field_simp
ring
· positivity
/-- The gaussian distribution pdf integrates to 1 when the variance is not zero. -/
lemma integral_gaussianPDFReal_eq_one (μ : ℝ) {v : ℝ≥0} (hv : v ≠ 0) :
∫ x, gaussianPDFReal μ v x = 1 := by
have h := lintegral_gaussianPDFReal_eq_one μ hv
rw [← ofReal_integral_eq_lintegral_ofReal (integrable_gaussianPDFReal _ _)
(ae_of_all _ (gaussianPDFReal_nonneg _ _)), ← ENNReal.ofReal_one] at h
rwa [← ENNReal.ofReal_eq_ofReal_iff (integral_nonneg (gaussianPDFReal_nonneg _ _)) zero_le_one]
lemma gaussianPDFReal_sub {μ : ℝ} {v : ℝ≥0} (x y : ℝ) :
gaussianPDFReal μ v (x - y) = gaussianPDFReal (μ + y) v x := by
simp only [gaussianPDFReal]
rw [sub_add_eq_sub_sub_swap]
lemma gaussianPDFReal_add {μ : ℝ} {v : ℝ≥0} (x y : ℝ) :
gaussianPDFReal μ v (x + y) = gaussianPDFReal (μ - y) v x := by
rw [sub_eq_add_neg, ← gaussianPDFReal_sub, sub_eq_add_neg, neg_neg]
lemma gaussianPDFReal_inv_mul {μ : ℝ} {v : ℝ≥0} {c : ℝ} (hc : c ≠ 0) (x : ℝ) :
gaussianPDFReal μ v (c⁻¹ * x) = |c| * gaussianPDFReal (c * μ) (⟨c^2, sq_nonneg _⟩ * v) x := by
simp only [gaussianPDFReal.eq_1, zero_lt_two, mul_nonneg_iff_of_pos_left, NNReal.zero_le_coe,
Real.sqrt_mul', one_div, mul_inv_rev, NNReal.coe_mul, NNReal.coe_mk, NNReal.coe_pos]
rw [← mul_assoc]
refine congr_arg₂ _ ?_ ?_
· field_simp
rw [Real.sqrt_sq_eq_abs]
ring_nf
calc (Real.sqrt ↑v)⁻¹ * (Real.sqrt 2)⁻¹ * (Real.sqrt π)⁻¹
= (Real.sqrt ↑v)⁻¹ * (Real.sqrt 2)⁻¹ * (Real.sqrt π)⁻¹ * (|c| * |c|⁻¹) := by
rw [mul_inv_cancel₀, mul_one]
simp only [ne_eq, abs_eq_zero, hc, not_false_eq_true]
_ = (Real.sqrt ↑v)⁻¹ * (Real.sqrt 2)⁻¹ * (Real.sqrt π)⁻¹ * |c| * |c|⁻¹ := by ring
· congr 1
field_simp
congr 1
ring
lemma gaussianPDFReal_mul {μ : ℝ} {v : ℝ≥0} {c : ℝ} (hc : c ≠ 0) (x : ℝ) :
gaussianPDFReal μ v (c * x)
= |c⁻¹| * gaussianPDFReal (c⁻¹ * μ) (⟨(c^2)⁻¹, inv_nonneg.mpr (sq_nonneg _)⟩ * v) x := by
conv_lhs => rw [← inv_inv c, gaussianPDFReal_inv_mul (inv_ne_zero hc)]
simp
/-- The pdf of a Gaussian distribution on ℝ with mean `μ` and variance `v`. -/
noncomputable
def gaussianPDF (μ : ℝ) (v : ℝ≥0) (x : ℝ) : ℝ≥0∞ := ENNReal.ofReal (gaussianPDFReal μ v x)
lemma gaussianPDF_def (μ : ℝ) (v : ℝ≥0) :
gaussianPDF μ v = fun x ↦ ENNReal.ofReal (gaussianPDFReal μ v x) := rfl
@[simp]
lemma gaussianPDF_zero_var (μ : ℝ) : gaussianPDF μ 0 = 0 := by ext; simp [gaussianPDF]
@[simp]
lemma toReal_gaussianPDF {μ : ℝ} {v : ℝ≥0} (x : ℝ) :
(gaussianPDF μ v x).toReal = gaussianPDFReal μ v x := by
rw [gaussianPDF, ENNReal.toReal_ofReal (gaussianPDFReal_nonneg μ v x)]
lemma gaussianPDF_pos (μ : ℝ) {v : ℝ≥0} (hv : v ≠ 0) (x : ℝ) : 0 < gaussianPDF μ v x := by
rw [gaussianPDF, ENNReal.ofReal_pos]
exact gaussianPDFReal_pos _ _ _ hv
lemma gaussianPDF_lt_top {μ : ℝ} {v : ℝ≥0} {x : ℝ} : gaussianPDF μ v x < ∞ := by simp [gaussianPDF]
lemma gaussianPDF_ne_top {μ : ℝ} {v : ℝ≥0} {x : ℝ} : gaussianPDF μ v x ≠ ∞ := by simp [gaussianPDF]
@[measurability, fun_prop]
lemma measurable_gaussianPDF (μ : ℝ) (v : ℝ≥0) : Measurable (gaussianPDF μ v) :=
(measurable_gaussianPDFReal _ _).ennreal_ofReal
@[simp]
lemma lintegral_gaussianPDF_eq_one (μ : ℝ) {v : ℝ≥0} (h : v ≠ 0) :
∫⁻ x, gaussianPDF μ v x = 1 :=
lintegral_gaussianPDFReal_eq_one μ h
end GaussianPDF
section GaussianReal
/-- A Gaussian distribution on `ℝ` with mean `μ` and variance `v`. -/
noncomputable
def gaussianReal (μ : ℝ) (v : ℝ≥0) : Measure ℝ :=
if v = 0 then Measure.dirac μ else volume.withDensity (gaussianPDF μ v)
lemma gaussianReal_of_var_ne_zero (μ : ℝ) {v : ℝ≥0} (hv : v ≠ 0) :
gaussianReal μ v = volume.withDensity (gaussianPDF μ v) := if_neg hv
@[simp]
lemma gaussianReal_zero_var (μ : ℝ) : gaussianReal μ 0 = Measure.dirac μ := if_pos rfl
instance instIsProbabilityMeasureGaussianReal (μ : ℝ) (v : ℝ≥0) :
IsProbabilityMeasure (gaussianReal μ v) where
measure_univ := by by_cases h : v = 0 <;> simp [gaussianReal_of_var_ne_zero, h]
lemma gaussianReal_apply (μ : ℝ) {v : ℝ≥0} (hv : v ≠ 0) (s : Set ℝ) :
gaussianReal μ v s = ∫⁻ x in s, gaussianPDF μ v x := by
rw [gaussianReal_of_var_ne_zero _ hv, withDensity_apply' _ s]
lemma gaussianReal_apply_eq_integral (μ : ℝ) {v : ℝ≥0} (hv : v ≠ 0) (s : Set ℝ) :
gaussianReal μ v s = ENNReal.ofReal (∫ x in s, gaussianPDFReal μ v x) := by
rw [gaussianReal_apply _ hv s, ofReal_integral_eq_lintegral_ofReal]
· rfl
· exact (integrable_gaussianPDFReal _ _).restrict
· exact ae_of_all _ (gaussianPDFReal_nonneg _ _)
lemma gaussianReal_absolutelyContinuous (μ : ℝ) {v : ℝ≥0} (hv : v ≠ 0) :
gaussianReal μ v ≪ volume := by
rw [gaussianReal_of_var_ne_zero _ hv]
exact withDensity_absolutelyContinuous _ _
lemma gaussianReal_absolutelyContinuous' (μ : ℝ) {v : ℝ≥0} (hv : v ≠ 0) :
volume ≪ gaussianReal μ v := by
rw [gaussianReal_of_var_ne_zero _ hv]
refine withDensity_absolutelyContinuous' ?_ ?_
· exact (measurable_gaussianPDF _ _).aemeasurable
· exact ae_of_all _ (fun _ ↦ (gaussianPDF_pos _ hv _).ne')
lemma rnDeriv_gaussianReal (μ : ℝ) (v : ℝ≥0) :
∂(gaussianReal μ v)/∂volume =ₐₛ gaussianPDF μ v := by
by_cases hv : v = 0
· simp only [hv, gaussianReal_zero_var, gaussianPDF_zero_var]
refine (Measure.eq_rnDeriv measurable_zero (mutuallySingular_dirac μ volume) ?_).symm
rw [withDensity_zero, add_zero]
· rw [gaussianReal_of_var_ne_zero _ hv]
exact Measure.rnDeriv_withDensity _ (measurable_gaussianPDF μ v)
lemma integral_gaussianReal_eq_integral_smul {E : Type*} [NormedAddCommGroup E] [NormedSpace ℝ E]
{μ : ℝ} {v : ℝ≥0} {f : ℝ → E} (hv : v ≠ 0) :
∫ x, f x ∂(gaussianReal μ v) = ∫ x, gaussianPDFReal μ v x • f x := by
simp [gaussianReal, hv,
integral_withDensity_eq_integral_toReal_smul (measurable_gaussianPDF _ _)
(ae_of_all _ fun _ ↦ gaussianPDF_lt_top)]
section Transformations
variable {μ : ℝ} {v : ℝ≥0}
lemma _root_.MeasurableEmbedding.gaussianReal_comap_apply (hv : v ≠ 0)
{f : ℝ → ℝ} (hf : MeasurableEmbedding f)
{f' : ℝ → ℝ} (h_deriv : ∀ x, HasDerivAt f (f' x) x) {s : Set ℝ} (hs : MeasurableSet s) :
(gaussianReal μ v).comap f s
= ENNReal.ofReal (∫ x in s, |f' x| * gaussianPDFReal μ v (f x)) := by
rw [gaussianReal_of_var_ne_zero _ hv, gaussianPDF_def]
exact hf.withDensity_ofReal_comap_apply_eq_integral_abs_deriv_mul' hs h_deriv
(ae_of_all _ (gaussianPDFReal_nonneg _ _)) (integrable_gaussianPDFReal _ _)
lemma _root_.MeasurableEquiv.gaussianReal_map_symm_apply (hv : v ≠ 0) (f : ℝ ≃ᵐ ℝ) {f' : ℝ → ℝ}
(h_deriv : ∀ x, HasDerivAt f (f' x) x) {s : Set ℝ} (hs : MeasurableSet s) :
(gaussianReal μ v).map f.symm s
= ENNReal.ofReal (∫ x in s, |f' x| * gaussianPDFReal μ v (f x)) := by
rw [gaussianReal_of_var_ne_zero _ hv, gaussianPDF_def]
exact f.withDensity_ofReal_map_symm_apply_eq_integral_abs_deriv_mul' hs h_deriv
(ae_of_all _ (gaussianPDFReal_nonneg _ _)) (integrable_gaussianPDFReal _ _)
/-- The map of a Gaussian distribution by addition of a constant is a Gaussian. -/
lemma gaussianReal_map_add_const (y : ℝ) :
(gaussianReal μ v).map (· + y) = gaussianReal (μ + y) v := by
by_cases hv : v = 0
· simp only [hv, ne_eq, not_true, gaussianReal_zero_var]
exact Measure.map_dirac (measurable_id'.add_const _) _
let e : ℝ ≃ᵐ ℝ := (Homeomorph.addRight y).symm.toMeasurableEquiv
have he' : ∀ x, HasDerivAt e ((fun _ ↦ 1) x) x := fun _ ↦ (hasDerivAt_id _).sub_const y
change (gaussianReal μ v).map e.symm = gaussianReal (μ + y) v
ext s' hs'
rw [MeasurableEquiv.gaussianReal_map_symm_apply hv e he' hs']
simp only [abs_neg, abs_one, MeasurableEquiv.coe_mk, Equiv.coe_fn_mk, one_mul, ne_eq]
rw [gaussianReal_apply_eq_integral _ hv s']
simp [e, gaussianPDFReal_sub _ y, Homeomorph.addRight, ← sub_eq_add_neg]
/-- The map of a Gaussian distribution by addition of a constant is a Gaussian. -/
lemma gaussianReal_map_const_add (y : ℝ) :
(gaussianReal μ v).map (y + ·) = gaussianReal (μ + y) v := by
simp_rw [add_comm y]
exact gaussianReal_map_add_const y
/-- The map of a Gaussian distribution by multiplication by a constant is a Gaussian. -/
lemma gaussianReal_map_const_mul (c : ℝ) :
(gaussianReal μ v).map (c * ·) = gaussianReal (c * μ) (⟨c^2, sq_nonneg _⟩ * v) := by
by_cases hv : v = 0
· simp only [hv, mul_zero, ne_eq, not_true, gaussianReal_zero_var]
exact Measure.map_dirac (measurable_id'.const_mul c) μ
by_cases hc : c = 0
· simp only [hc, zero_mul, ne_eq, abs_zero, mul_eq_zero]
rw [Measure.map_const]
simp only [ne_eq, measure_univ, one_smul, mul_eq_zero]
convert (gaussianReal_zero_var 0).symm
simp only [ne_eq, zero_pow, mul_eq_zero, hv, or_false, not_false_eq_true, reduceCtorEq,
NNReal.mk_zero]
let e : ℝ ≃ᵐ ℝ := (Homeomorph.mulLeft₀ c hc).symm.toMeasurableEquiv
have he' : ∀ x, HasDerivAt e ((fun _ ↦ c⁻¹) x) x := by
suffices ∀ x, HasDerivAt (fun x => c⁻¹ * x) (c⁻¹ * 1) x by rwa [mul_one] at this
exact fun _ ↦ HasDerivAt.const_mul _ (hasDerivAt_id _)
change (gaussianReal μ v).map e.symm = gaussianReal (c * μ) (⟨c^2, sq_nonneg _⟩ * v)
ext s' hs'
rw [MeasurableEquiv.gaussianReal_map_symm_apply hv e he' hs',
gaussianReal_apply_eq_integral _ _ s']
swap
· simp only [ne_eq, mul_eq_zero, hv, or_false]
rw [← NNReal.coe_inj]
simp [hc]
simp only [e, Homeomorph.mulLeft₀, Equiv.toFun_as_coe, Equiv.mulLeft₀_apply, Equiv.invFun_as_coe,
Equiv.mulLeft₀_symm_apply, Homeomorph.toMeasurableEquiv_coe, Homeomorph.homeomorph_mk_coe_symm,
| Equiv.coe_fn_symm_mk, gaussianPDFReal_inv_mul hc]
congr with x
suffices |c⁻¹| * |c| = 1 by rw [← mul_assoc, this, one_mul]
rw [abs_inv, inv_mul_cancel₀]
rwa [ne_eq, abs_eq_zero]
/-- The map of a Gaussian distribution by multiplication by a constant is a Gaussian. -/
lemma gaussianReal_map_mul_const (c : ℝ) :
| Mathlib/Probability/Distributions/Gaussian.lean | 316 | 323 |
/-
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). -/
theorem dist_eq_add_dist_of_angle_eq_pi {p₁ p₂ p₃ : P} (h : ∠ p₁ p₂ p₃ = π) :
dist p₁ p₃ = dist p₁ p₂ + dist p₃ p₂ := by
rw [dist_eq_norm_vsub V, dist_eq_norm_vsub V, dist_eq_norm_vsub V, ← vsub_sub_vsub_cancel_right]
| exact norm_sub_eq_add_norm_of_angle_eq_pi h
/-- If A ≠ B and C ≠ B then ∠ABC = π if and only if (dist A C) = (dist A B) + (dist B C). -/
theorem dist_eq_add_dist_iff_angle_eq_pi {p₁ p₂ p₃ : P} (hp₁p₂ : p₁ ≠ p₂) (hp₃p₂ : p₃ ≠ p₂) :
dist p₁ p₃ = dist p₁ p₂ + dist p₃ p₂ ↔ ∠ p₁ p₂ p₃ = π := by
rw [dist_eq_norm_vsub V, dist_eq_norm_vsub V, dist_eq_norm_vsub V, ← vsub_sub_vsub_cancel_right]
| Mathlib/Geometry/Euclidean/Angle/Unoriented/Affine.lean | 196 | 201 |
/-
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.Analysis.Complex.Basic
import Mathlib.Topology.FiberBundle.IsHomeomorphicTrivialBundle
/-!
# Closure, interior, and frontier of preimages under `re` and `im`
In this fact we use the fact that `ℂ` is naturally homeomorphic to `ℝ × ℝ` to deduce some
topological properties of `Complex.re` and `Complex.im`.
## Main statements
Each statement about `Complex.re` listed below has a counterpart about `Complex.im`.
* `Complex.isHomeomorphicTrivialFiberBundle_re`: `Complex.re` turns `ℂ` into a trivial
topological fiber bundle over `ℝ`;
* `Complex.isOpenMap_re`, `Complex.isQuotientMap_re`: in particular, `Complex.re` is an open map
and is a quotient map;
* `Complex.interior_preimage_re`, `Complex.closure_preimage_re`, `Complex.frontier_preimage_re`:
formulas for `interior (Complex.re ⁻¹' s)` etc;
* `Complex.interior_setOf_re_le` etc: particular cases of the above formulas in the cases when `s`
is one of the infinite intervals `Set.Ioi a`, `Set.Ici a`, `Set.Iio a`, and `Set.Iic a`,
formulated as `interior {z : ℂ | z.re ≤ a} = {z | z.re < a}` etc.
## Tags
complex, real part, imaginary part, closure, interior, frontier
-/
open Set Topology
noncomputable section
namespace Complex
/-- `Complex.re` turns `ℂ` into a trivial topological fiber bundle over `ℝ`. -/
theorem isHomeomorphicTrivialFiberBundle_re : IsHomeomorphicTrivialFiberBundle ℝ re :=
⟨equivRealProdCLM.toHomeomorph, fun _ => rfl⟩
/-- `Complex.im` turns `ℂ` into a trivial topological fiber bundle over `ℝ`. -/
theorem isHomeomorphicTrivialFiberBundle_im : IsHomeomorphicTrivialFiberBundle ℝ im :=
⟨equivRealProdCLM.toHomeomorph.trans (Homeomorph.prodComm ℝ ℝ), fun _ => rfl⟩
theorem isOpenMap_re : IsOpenMap re :=
isHomeomorphicTrivialFiberBundle_re.isOpenMap_proj
theorem isOpenMap_im : IsOpenMap im :=
isHomeomorphicTrivialFiberBundle_im.isOpenMap_proj
theorem isQuotientMap_re : IsQuotientMap re :=
isHomeomorphicTrivialFiberBundle_re.isQuotientMap_proj
@[deprecated (since := "2024-10-22")]
alias quotientMap_re := isQuotientMap_re
theorem isQuotientMap_im : IsQuotientMap im :=
isHomeomorphicTrivialFiberBundle_im.isQuotientMap_proj
@[deprecated (since := "2024-10-22")]
alias quotientMap_im := isQuotientMap_im
theorem interior_preimage_re (s : Set ℝ) : interior (re ⁻¹' s) = re ⁻¹' interior s :=
(isOpenMap_re.preimage_interior_eq_interior_preimage continuous_re _).symm
theorem interior_preimage_im (s : Set ℝ) : interior (im ⁻¹' s) = im ⁻¹' interior s :=
(isOpenMap_im.preimage_interior_eq_interior_preimage continuous_im _).symm
theorem closure_preimage_re (s : Set ℝ) : closure (re ⁻¹' s) = re ⁻¹' closure s :=
(isOpenMap_re.preimage_closure_eq_closure_preimage continuous_re _).symm
theorem closure_preimage_im (s : Set ℝ) : closure (im ⁻¹' s) = im ⁻¹' closure s :=
(isOpenMap_im.preimage_closure_eq_closure_preimage continuous_im _).symm
theorem frontier_preimage_re (s : Set ℝ) : frontier (re ⁻¹' s) = re ⁻¹' frontier s :=
(isOpenMap_re.preimage_frontier_eq_frontier_preimage continuous_re _).symm
theorem frontier_preimage_im (s : Set ℝ) : frontier (im ⁻¹' s) = im ⁻¹' frontier s :=
(isOpenMap_im.preimage_frontier_eq_frontier_preimage continuous_im _).symm
@[simp]
theorem interior_setOf_re_le (a : ℝ) : interior { z : ℂ | z.re ≤ a } = { z | z.re < a } := by
simpa only [interior_Iic] using interior_preimage_re (Iic a)
@[simp]
theorem interior_setOf_im_le (a : ℝ) : interior { z : ℂ | z.im ≤ a } = { z | z.im < a } := by
simpa only [interior_Iic] using interior_preimage_im (Iic a)
@[simp]
theorem interior_setOf_le_re (a : ℝ) : interior { z : ℂ | a ≤ z.re } = { z | a < z.re } := by
simpa only [interior_Ici] using interior_preimage_re (Ici a)
@[simp]
theorem interior_setOf_le_im (a : ℝ) : interior { z : ℂ | a ≤ z.im } = { z | a < z.im } := by
simpa only [interior_Ici] using interior_preimage_im (Ici a)
@[simp]
theorem closure_setOf_re_lt (a : ℝ) : closure { z : ℂ | z.re < a } = { z | z.re ≤ a } := by
simpa only [closure_Iio] using closure_preimage_re (Iio a)
@[simp]
theorem closure_setOf_im_lt (a : ℝ) : closure { z : ℂ | z.im < a } = { z | z.im ≤ a } := by
simpa only [closure_Iio] using closure_preimage_im (Iio a)
@[simp]
theorem closure_setOf_lt_re (a : ℝ) : closure { z : ℂ | a < z.re } = { z | a ≤ z.re } := by
simpa only [closure_Ioi] using closure_preimage_re (Ioi a)
@[simp]
theorem closure_setOf_lt_im (a : ℝ) : closure { z : ℂ | a < z.im } = { z | a ≤ z.im } := by
simpa only [closure_Ioi] using closure_preimage_im (Ioi a)
@[simp]
theorem frontier_setOf_re_le (a : ℝ) : frontier { z : ℂ | z.re ≤ a } = { z | z.re = a } := by
simpa only [frontier_Iic] using frontier_preimage_re (Iic a)
@[simp]
theorem frontier_setOf_im_le (a : ℝ) : frontier { z : ℂ | z.im ≤ a } = { z | z.im = a } := by
simpa only [frontier_Iic] using frontier_preimage_im (Iic a)
@[simp]
theorem frontier_setOf_le_re (a : ℝ) : frontier { z : ℂ | a ≤ z.re } = { z | z.re = a } := by
simpa only [frontier_Ici] using frontier_preimage_re (Ici a)
@[simp]
theorem frontier_setOf_le_im (a : ℝ) : frontier { z : ℂ | a ≤ z.im } = { z | z.im = a } := by
simpa only [frontier_Ici] using frontier_preimage_im (Ici a)
@[simp]
theorem frontier_setOf_re_lt (a : ℝ) : frontier { z : ℂ | z.re < a } = { z | z.re = a } := by
simpa only [frontier_Iio] using frontier_preimage_re (Iio a)
@[simp]
theorem frontier_setOf_im_lt (a : ℝ) : frontier { z : ℂ | z.im < a } = { z | z.im = a } := by
simpa only [frontier_Iio] using frontier_preimage_im (Iio a)
@[simp]
theorem frontier_setOf_lt_re (a : ℝ) : frontier { z : ℂ | a < z.re } = { z | z.re = a } := by
simpa only [frontier_Ioi] using frontier_preimage_re (Ioi a)
@[simp]
theorem frontier_setOf_lt_im (a : ℝ) : frontier { z : ℂ | a < z.im } = { z | z.im = a } := by
simpa only [frontier_Ioi] using frontier_preimage_im (Ioi a)
theorem closure_reProdIm (s t : Set ℝ) : closure (s ×ℂ t) = closure s ×ℂ closure t := by
simpa only [← preimage_eq_preimage equivRealProdCLM.symm.toHomeomorph.surjective,
equivRealProdCLM.symm.toHomeomorph.preimage_closure] using @closure_prod_eq _ _ _ _ s t
theorem interior_reProdIm (s t : Set ℝ) : interior (s ×ℂ t) = interior s ×ℂ interior t := by
rw [reProdIm, reProdIm, interior_inter, interior_preimage_re, interior_preimage_im]
theorem frontier_reProdIm (s t : Set ℝ) :
frontier (s ×ℂ t) = closure s ×ℂ frontier t ∪ frontier s ×ℂ closure t := by
simpa only [← preimage_eq_preimage equivRealProdCLM.symm.toHomeomorph.surjective,
equivRealProdCLM.symm.toHomeomorph.preimage_frontier] using frontier_prod_eq s t
theorem frontier_setOf_le_re_and_le_im (a b : ℝ) :
frontier { z | a ≤ re z ∧ b ≤ im z } = { z | a ≤ re z ∧ im z = b ∨ re z = a ∧ b ≤ im z } := by
simpa only [closure_Ici, frontier_Ici] using frontier_reProdIm (Ici a) (Ici b)
theorem frontier_setOf_le_re_and_im_le (a b : ℝ) :
frontier { z | a ≤ re z ∧ im z ≤ b } = { z | a ≤ re z ∧ im z = b ∨ re z = a ∧ im z ≤ b } := by
simpa only [closure_Ici, closure_Iic, frontier_Ici, frontier_Iic] using
frontier_reProdIm (Ici a) (Iic b)
| end Complex
| Mathlib/Analysis/Complex/ReImTopology.lean | 169 | 170 |
/-
Copyright (c) 2024 Andrew Yang. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Andrew Yang
-/
import Mathlib.RingTheory.Kaehler.Basic
import Mathlib.Algebra.MvPolynomial.PDeriv
import Mathlib.Algebra.Polynomial.Derivation
/-!
# The Kaehler differential module of polynomial algebras
-/
open scoped TensorProduct
open Algebra
universe u v
variable (R : Type u) [CommRing R]
suppress_compilation
section MvPolynomial
/-- The relative differential module of a polynomial algebra `R[σ]` is the free module generated by
`{ dx | x ∈ σ }`. Also see `KaehlerDifferential.mvPolynomialBasis`. -/
def KaehlerDifferential.mvPolynomialEquiv (σ : Type*) :
Ω[MvPolynomial σ R⁄R] ≃ₗ[MvPolynomial σ R] σ →₀ MvPolynomial σ R where
__ := (MvPolynomial.mkDerivation _ (Finsupp.single · 1)).liftKaehlerDifferential
invFun := Finsupp.linearCombination (α := σ) _ (fun x ↦ D _ _ (MvPolynomial.X x))
right_inv := by
intro x
induction x using Finsupp.induction_linear with
| zero => simp only [AddHom.toFun_eq_coe, LinearMap.coe_toAddHom]; rw [map_zero, map_zero]
| add => simp only [AddHom.toFun_eq_coe, LinearMap.coe_toAddHom, map_add] at *; simp only [*]
| single a b => simp [LinearMap.map_smul, -map_smul]
left_inv := by
intro x
obtain ⟨x, rfl⟩ := linearCombination_surjective _ _ x
induction x using Finsupp.induction_linear with
| zero =>
simp only [AddHom.toFun_eq_coe, LinearMap.coe_toAddHom]
rw [map_zero, map_zero, map_zero]
| add => simp only [map_add, AddHom.toFun_eq_coe, LinearMap.coe_toAddHom] at *; simp only [*]
| single a b =>
simp only [AddHom.toFun_eq_coe, LinearMap.coe_toAddHom, Finsupp.linearCombination_single,
LinearMap.map_smul, Derivation.liftKaehlerDifferential_comp_D]
congr 1
induction a using MvPolynomial.induction_on
· simp only [MvPolynomial.derivation_C, map_zero]
· simp only [map_add, *]
· simp [*]
/-- `{ dx | x ∈ σ }` forms a basis of the relative differential module
of a polynomial algebra `R[σ]`. -/
def KaehlerDifferential.mvPolynomialBasis (σ) :
Basis σ (MvPolynomial σ R) (Ω[MvPolynomial σ R⁄R]) :=
⟨mvPolynomialEquiv R σ⟩
lemma KaehlerDifferential.mvPolynomialBasis_repr_comp_D (σ) :
(mvPolynomialBasis R σ).repr.toLinearMap.compDer (D _ _) =
MvPolynomial.mkDerivation _ (Finsupp.single · 1) :=
Derivation.liftKaehlerDifferential_comp _
lemma KaehlerDifferential.mvPolynomialBasis_repr_D (σ) (x) :
(mvPolynomialBasis R σ).repr (D _ _ x) =
MvPolynomial.mkDerivation R (Finsupp.single · (1 : MvPolynomial σ R)) x :=
Derivation.congr_fun (mvPolynomialBasis_repr_comp_D R σ) x
@[simp]
lemma KaehlerDifferential.mvPolynomialBasis_repr_D_X (σ) (i) :
| (mvPolynomialBasis R σ).repr (D _ _ (.X i)) = Finsupp.single i 1 := by
simp [mvPolynomialBasis_repr_D]
@[simp]
lemma KaehlerDifferential.mvPolynomialBasis_repr_apply (σ) (x) (i) :
(mvPolynomialBasis R σ).repr (D _ _ x) i = MvPolynomial.pderiv i x := by
classical
suffices ((Finsupp.lapply i).comp
(mvPolynomialBasis R σ).repr.toLinearMap).compDer (D _ _) = MvPolynomial.pderiv i by
rw [← this]; rfl
| Mathlib/RingTheory/Kaehler/Polynomial.lean | 72 | 81 |
/-
Copyright (c) 2021 Rémy Degenne. 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.FinMeasAdditive
/-!
# Extension of a linear function from indicators to L1
Given `T : Set α → E →L[ℝ] F` with `DominatedFinMeasAdditive μ T C`, we construct an extension
of `T` to integrable simple functions, which are finite sums of indicators of measurable sets
with finite measure, then to integrable functions, which are limits of integrable simple functions.
The main result is a continuous linear map `(α →₁[μ] E) →L[ℝ] F`.
This extension process is used to define the Bochner integral
in the `Mathlib.MeasureTheory.Integral.Bochner.Basic` file
and the conditional expectation of an integrable function
in `Mathlib.MeasureTheory.Function.ConditionalExpectation.CondexpL1`.
## Main definitions
- `setToL1 (hT : DominatedFinMeasAdditive μ T C) : (α →₁[μ] E) →L[ℝ] F`: the extension of `T`
from indicators to L1.
- `setToFun μ T (hT : DominatedFinMeasAdditive μ T C) (f : α → E) : F`: a version of the
extension which applies to functions (with value 0 if the function is not integrable).
## Properties
For most properties of `setToFun`, we provide two lemmas. One version uses hypotheses valid on
all sets, like `T = T'`, and a second version which uses a primed name uses hypotheses on
measurable sets with finite measure, like `∀ s, MeasurableSet s → μ s < ∞ → T s = T' s`.
The lemmas listed here don't show all hypotheses. Refer to the actual lemmas for details.
Linearity:
- `setToFun_zero_left : setToFun μ 0 hT f = 0`
- `setToFun_add_left : setToFun μ (T + T') _ f = setToFun μ T hT f + setToFun μ T' hT' f`
- `setToFun_smul_left : setToFun μ (fun s ↦ c • (T s)) (hT.smul c) f = c • setToFun μ T hT f`
- `setToFun_zero : setToFun μ T hT (0 : α → E) = 0`
- `setToFun_neg : setToFun μ T hT (-f) = - setToFun μ T hT f`
If `f` and `g` are integrable:
- `setToFun_add : setToFun μ T hT (f + g) = setToFun μ T hT f + setToFun μ T hT g`
- `setToFun_sub : setToFun μ T hT (f - g) = setToFun μ T hT f - setToFun μ T hT g`
If `T` is verifies `∀ c : 𝕜, ∀ s x, T s (c • x) = c • T s x`:
- `setToFun_smul : setToFun μ T hT (c • f) = c • setToFun μ T hT f`
Other:
- `setToFun_congr_ae (h : f =ᵐ[μ] g) : setToFun μ T hT f = setToFun μ T hT g`
- `setToFun_measure_zero (h : μ = 0) : setToFun μ T hT f = 0`
If the space is also an ordered additive group with an order closed topology and `T` is such that
`0 ≤ T s x` for `0 ≤ x`, we also prove order-related properties:
- `setToFun_mono_left (h : ∀ s x, T s x ≤ T' s x) : setToFun μ T hT f ≤ setToFun μ T' hT' f`
- `setToFun_nonneg (hf : 0 ≤ᵐ[μ] f) : 0 ≤ setToFun μ T hT f`
- `setToFun_mono (hfg : f ≤ᵐ[μ] g) : setToFun μ T hT f ≤ setToFun μ T hT g`
-/
noncomputable section
open scoped Topology NNReal
open Set Filter TopologicalSpace ENNReal
namespace MeasureTheory
variable {α E F F' G 𝕜 : Type*} [NormedAddCommGroup E] [NormedSpace ℝ E]
[NormedAddCommGroup F] [NormedSpace ℝ F] [NormedAddCommGroup F'] [NormedSpace ℝ F']
[NormedAddCommGroup G] {m : MeasurableSpace α} {μ : Measure α}
namespace L1
open AEEqFun Lp.simpleFunc Lp
namespace SimpleFunc
theorem norm_eq_sum_mul (f : α →₁ₛ[μ] G) :
‖f‖ = ∑ x ∈ (toSimpleFunc f).range, μ.real (toSimpleFunc f ⁻¹' {x}) * ‖x‖ := by
rw [norm_toSimpleFunc, eLpNorm_one_eq_lintegral_enorm]
have h_eq := SimpleFunc.map_apply (‖·‖ₑ) (toSimpleFunc f)
simp_rw [← h_eq, measureReal_def]
rw [SimpleFunc.lintegral_eq_lintegral, SimpleFunc.map_lintegral, ENNReal.toReal_sum]
· congr
ext1 x
rw [ENNReal.toReal_mul, mul_comm, ← ofReal_norm_eq_enorm,
ENNReal.toReal_ofReal (norm_nonneg _)]
· intro x _
by_cases hx0 : x = 0
· rw [hx0]; simp
· exact
ENNReal.mul_ne_top ENNReal.coe_ne_top
(SimpleFunc.measure_preimage_lt_top_of_integrable _ (SimpleFunc.integrable f) hx0).ne
section SetToL1S
variable [NormedField 𝕜] [NormedSpace 𝕜 E]
attribute [local instance] Lp.simpleFunc.module
attribute [local instance] Lp.simpleFunc.normedSpace
/-- Extend `Set α → (E →L[ℝ] F')` to `(α →₁ₛ[μ] E) → F'`. -/
def setToL1S (T : Set α → E →L[ℝ] F) (f : α →₁ₛ[μ] E) : F :=
(toSimpleFunc f).setToSimpleFunc T
theorem setToL1S_eq_setToSimpleFunc (T : Set α → E →L[ℝ] F) (f : α →₁ₛ[μ] E) :
setToL1S T f = (toSimpleFunc f).setToSimpleFunc T :=
rfl
@[simp]
theorem setToL1S_zero_left (f : α →₁ₛ[μ] E) : setToL1S (0 : Set α → E →L[ℝ] F) f = 0 :=
SimpleFunc.setToSimpleFunc_zero _
theorem setToL1S_zero_left' {T : Set α → E →L[ℝ] F}
(h_zero : ∀ s, MeasurableSet s → μ s < ∞ → T s = 0) (f : α →₁ₛ[μ] E) : setToL1S T f = 0 :=
SimpleFunc.setToSimpleFunc_zero' h_zero _ (SimpleFunc.integrable f)
theorem setToL1S_congr (T : Set α → E →L[ℝ] F) (h_zero : ∀ s, MeasurableSet s → μ s = 0 → T s = 0)
(h_add : FinMeasAdditive μ T) {f g : α →₁ₛ[μ] E} (h : toSimpleFunc f =ᵐ[μ] toSimpleFunc g) :
setToL1S T f = setToL1S T g :=
SimpleFunc.setToSimpleFunc_congr T h_zero h_add (SimpleFunc.integrable f) h
theorem setToL1S_congr_left (T T' : Set α → E →L[ℝ] F)
(h : ∀ s, MeasurableSet s → μ s < ∞ → T s = T' s) (f : α →₁ₛ[μ] E) :
setToL1S T f = setToL1S T' f :=
SimpleFunc.setToSimpleFunc_congr_left T T' h (simpleFunc.toSimpleFunc f) (SimpleFunc.integrable f)
/-- `setToL1S` does not change if we replace the measure `μ` by `μ'` with `μ ≪ μ'`. The statement
uses two functions `f` and `f'` because they have to belong to different types, but morally these
are the same function (we have `f =ᵐ[μ] f'`). -/
theorem setToL1S_congr_measure {μ' : Measure α} (T : Set α → E →L[ℝ] F)
(h_zero : ∀ s, MeasurableSet s → μ s = 0 → T s = 0) (h_add : FinMeasAdditive μ T) (hμ : μ ≪ μ')
(f : α →₁ₛ[μ] E) (f' : α →₁ₛ[μ'] E) (h : (f : α → E) =ᵐ[μ] f') :
setToL1S T f = setToL1S T f' := by
refine SimpleFunc.setToSimpleFunc_congr T h_zero h_add (SimpleFunc.integrable f) ?_
refine (toSimpleFunc_eq_toFun f).trans ?_
suffices (f' : α → E) =ᵐ[μ] simpleFunc.toSimpleFunc f' from h.trans this
have goal' : (f' : α → E) =ᵐ[μ'] simpleFunc.toSimpleFunc f' := (toSimpleFunc_eq_toFun f').symm
exact hμ.ae_eq goal'
theorem setToL1S_add_left (T T' : Set α → E →L[ℝ] F) (f : α →₁ₛ[μ] E) :
setToL1S (T + T') f = setToL1S T f + setToL1S T' f :=
SimpleFunc.setToSimpleFunc_add_left T T'
theorem setToL1S_add_left' (T T' T'' : Set α → E →L[ℝ] F)
(h_add : ∀ s, MeasurableSet s → μ s < ∞ → T'' s = T s + T' s) (f : α →₁ₛ[μ] E) :
setToL1S T'' f = setToL1S T f + setToL1S T' f :=
SimpleFunc.setToSimpleFunc_add_left' T T' T'' h_add (SimpleFunc.integrable f)
theorem setToL1S_smul_left (T : Set α → E →L[ℝ] F) (c : ℝ) (f : α →₁ₛ[μ] E) :
setToL1S (fun s => c • T s) f = c • setToL1S T f :=
SimpleFunc.setToSimpleFunc_smul_left T c _
theorem setToL1S_smul_left' (T T' : Set α → E →L[ℝ] F) (c : ℝ)
(h_smul : ∀ s, MeasurableSet s → μ s < ∞ → T' s = c • T s) (f : α →₁ₛ[μ] E) :
setToL1S T' f = c • setToL1S T f :=
SimpleFunc.setToSimpleFunc_smul_left' T T' c h_smul (SimpleFunc.integrable f)
theorem setToL1S_add (T : Set α → E →L[ℝ] F) (h_zero : ∀ s, MeasurableSet s → μ s = 0 → T s = 0)
(h_add : FinMeasAdditive μ T) (f g : α →₁ₛ[μ] E) :
setToL1S T (f + g) = setToL1S T f + setToL1S T g := by
simp_rw [setToL1S]
rw [← SimpleFunc.setToSimpleFunc_add T h_add (SimpleFunc.integrable f)
(SimpleFunc.integrable g)]
exact
SimpleFunc.setToSimpleFunc_congr T h_zero h_add (SimpleFunc.integrable _)
(add_toSimpleFunc f g)
theorem setToL1S_neg {T : Set α → E →L[ℝ] F} (h_zero : ∀ s, MeasurableSet s → μ s = 0 → T s = 0)
(h_add : FinMeasAdditive μ T) (f : α →₁ₛ[μ] E) : setToL1S T (-f) = -setToL1S T f := by
simp_rw [setToL1S]
have : simpleFunc.toSimpleFunc (-f) =ᵐ[μ] ⇑(-simpleFunc.toSimpleFunc f) :=
neg_toSimpleFunc f
rw [SimpleFunc.setToSimpleFunc_congr T h_zero h_add (SimpleFunc.integrable _) this]
exact SimpleFunc.setToSimpleFunc_neg T h_add (SimpleFunc.integrable f)
theorem setToL1S_sub {T : Set α → E →L[ℝ] F} (h_zero : ∀ s, MeasurableSet s → μ s = 0 → T s = 0)
(h_add : FinMeasAdditive μ T) (f g : α →₁ₛ[μ] E) :
setToL1S T (f - g) = setToL1S T f - setToL1S T g := by
rw [sub_eq_add_neg, setToL1S_add T h_zero h_add, setToL1S_neg h_zero h_add, sub_eq_add_neg]
theorem setToL1S_smul_real (T : Set α → E →L[ℝ] F)
(h_zero : ∀ s, MeasurableSet s → μ s = 0 → T s = 0) (h_add : FinMeasAdditive μ T) (c : ℝ)
(f : α →₁ₛ[μ] E) : setToL1S T (c • f) = c • setToL1S T f := by
simp_rw [setToL1S]
rw [← SimpleFunc.setToSimpleFunc_smul_real T h_add c (SimpleFunc.integrable f)]
refine SimpleFunc.setToSimpleFunc_congr T h_zero h_add (SimpleFunc.integrable _) ?_
exact smul_toSimpleFunc c f
theorem setToL1S_smul {E} [NormedAddCommGroup E] [NormedSpace ℝ E] [NormedSpace 𝕜 E]
[DistribSMul 𝕜 F] (T : Set α → E →L[ℝ] F) (h_zero : ∀ s, MeasurableSet s → μ s = 0 → T s = 0)
(h_add : FinMeasAdditive μ T) (h_smul : ∀ c : 𝕜, ∀ s x, T s (c • x) = c • T s x) (c : 𝕜)
(f : α →₁ₛ[μ] E) : setToL1S T (c • f) = c • setToL1S T f := by
simp_rw [setToL1S]
rw [← SimpleFunc.setToSimpleFunc_smul T h_add h_smul c (SimpleFunc.integrable f)]
refine SimpleFunc.setToSimpleFunc_congr T h_zero h_add (SimpleFunc.integrable _) ?_
exact smul_toSimpleFunc c f
theorem norm_setToL1S_le (T : Set α → E →L[ℝ] F) {C : ℝ}
(hT_norm : ∀ s, MeasurableSet s → μ s < ∞ → ‖T s‖ ≤ C * μ.real s) (f : α →₁ₛ[μ] E) :
‖setToL1S T f‖ ≤ C * ‖f‖ := by
rw [setToL1S, norm_eq_sum_mul f]
exact
SimpleFunc.norm_setToSimpleFunc_le_sum_mul_norm_of_integrable T hT_norm _
(SimpleFunc.integrable f)
theorem setToL1S_indicatorConst {T : Set α → E →L[ℝ] F} {s : Set α}
(h_zero : ∀ s, MeasurableSet s → μ s = 0 → T s = 0) (h_add : FinMeasAdditive μ T)
(hs : MeasurableSet s) (hμs : μ s < ∞) (x : E) :
setToL1S T (simpleFunc.indicatorConst 1 hs hμs.ne x) = T s x := by
have h_empty : T ∅ = 0 := h_zero _ MeasurableSet.empty measure_empty
rw [setToL1S_eq_setToSimpleFunc]
refine Eq.trans ?_ (SimpleFunc.setToSimpleFunc_indicator T h_empty hs x)
refine SimpleFunc.setToSimpleFunc_congr T h_zero h_add (SimpleFunc.integrable _) ?_
exact toSimpleFunc_indicatorConst hs hμs.ne x
theorem setToL1S_const [IsFiniteMeasure μ] {T : Set α → E →L[ℝ] F}
(h_zero : ∀ s, MeasurableSet s → μ s = 0 → T s = 0) (h_add : FinMeasAdditive μ T) (x : E) :
setToL1S T (simpleFunc.indicatorConst 1 MeasurableSet.univ (measure_ne_top μ _) x) = T univ x :=
setToL1S_indicatorConst h_zero h_add MeasurableSet.univ (measure_lt_top _ _) x
section Order
variable {G'' G' : Type*}
[NormedAddCommGroup G'] [PartialOrder G'] [IsOrderedAddMonoid G'] [NormedSpace ℝ G']
[NormedAddCommGroup G''] [PartialOrder G''] [IsOrderedAddMonoid G''] [NormedSpace ℝ G'']
{T : Set α → G'' →L[ℝ] G'}
theorem setToL1S_mono_left {T T' : Set α → E →L[ℝ] G''} (hTT' : ∀ s x, T s x ≤ T' s x)
(f : α →₁ₛ[μ] E) : setToL1S T f ≤ setToL1S T' f :=
SimpleFunc.setToSimpleFunc_mono_left T T' hTT' _
theorem setToL1S_mono_left' {T T' : Set α → E →L[ℝ] G''}
(hTT' : ∀ s, MeasurableSet s → μ s < ∞ → ∀ x, T s x ≤ T' s x) (f : α →₁ₛ[μ] E) :
setToL1S T f ≤ setToL1S T' f :=
SimpleFunc.setToSimpleFunc_mono_left' T T' hTT' _ (SimpleFunc.integrable f)
omit [IsOrderedAddMonoid G''] in
theorem setToL1S_nonneg (h_zero : ∀ s, MeasurableSet s → μ s = 0 → T s = 0)
(h_add : FinMeasAdditive μ T)
(hT_nonneg : ∀ s, MeasurableSet s → μ s < ∞ → ∀ x, 0 ≤ x → 0 ≤ T s x) {f : α →₁ₛ[μ] G''}
(hf : 0 ≤ f) : 0 ≤ setToL1S T f := by
simp_rw [setToL1S]
obtain ⟨f', hf', hff'⟩ := exists_simpleFunc_nonneg_ae_eq hf
replace hff' : simpleFunc.toSimpleFunc f =ᵐ[μ] f' :=
(Lp.simpleFunc.toSimpleFunc_eq_toFun f).trans hff'
rw [SimpleFunc.setToSimpleFunc_congr _ h_zero h_add (SimpleFunc.integrable _) hff']
exact
SimpleFunc.setToSimpleFunc_nonneg' T hT_nonneg _ hf' ((SimpleFunc.integrable f).congr hff')
theorem setToL1S_mono (h_zero : ∀ s, MeasurableSet s → μ s = 0 → T s = 0)
(h_add : FinMeasAdditive μ T)
(hT_nonneg : ∀ s, MeasurableSet s → μ s < ∞ → ∀ x, 0 ≤ x → 0 ≤ T s x) {f g : α →₁ₛ[μ] G''}
(hfg : f ≤ g) : setToL1S T f ≤ setToL1S T g := by
rw [← sub_nonneg] at hfg ⊢
rw [← setToL1S_sub h_zero h_add]
exact setToL1S_nonneg h_zero h_add hT_nonneg hfg
end Order
variable [NormedSpace 𝕜 F]
variable (α E μ 𝕜)
/-- Extend `Set α → E →L[ℝ] F` to `(α →₁ₛ[μ] E) →L[𝕜] F`. -/
def setToL1SCLM' {T : Set α → E →L[ℝ] F} {C : ℝ} (hT : DominatedFinMeasAdditive μ T C)
(h_smul : ∀ c : 𝕜, ∀ s x, T s (c • x) = c • T s x) : (α →₁ₛ[μ] E) →L[𝕜] F :=
LinearMap.mkContinuous
⟨⟨setToL1S T, setToL1S_add T (fun _ => hT.eq_zero_of_measure_zero) hT.1⟩,
setToL1S_smul T (fun _ => hT.eq_zero_of_measure_zero) hT.1 h_smul⟩
C fun f => norm_setToL1S_le T hT.2 f
/-- Extend `Set α → E →L[ℝ] F` to `(α →₁ₛ[μ] E) →L[ℝ] F`. -/
def setToL1SCLM {T : Set α → E →L[ℝ] F} {C : ℝ} (hT : DominatedFinMeasAdditive μ T C) :
(α →₁ₛ[μ] E) →L[ℝ] F :=
LinearMap.mkContinuous
⟨⟨setToL1S T, setToL1S_add T (fun _ => hT.eq_zero_of_measure_zero) hT.1⟩,
setToL1S_smul_real T (fun _ => hT.eq_zero_of_measure_zero) hT.1⟩
C fun f => norm_setToL1S_le T hT.2 f
variable {α E μ 𝕜}
variable {T T' T'' : Set α → E →L[ℝ] F} {C C' C'' : ℝ}
@[simp]
theorem setToL1SCLM_zero_left (hT : DominatedFinMeasAdditive μ (0 : Set α → E →L[ℝ] F) C)
(f : α →₁ₛ[μ] E) : setToL1SCLM α E μ hT f = 0 :=
setToL1S_zero_left _
theorem setToL1SCLM_zero_left' (hT : DominatedFinMeasAdditive μ T C)
(h_zero : ∀ s, MeasurableSet s → μ s < ∞ → T s = 0) (f : α →₁ₛ[μ] E) :
setToL1SCLM α E μ hT f = 0 :=
setToL1S_zero_left' h_zero f
theorem setToL1SCLM_congr_left (hT : DominatedFinMeasAdditive μ T C)
(hT' : DominatedFinMeasAdditive μ T' C') (h : T = T') (f : α →₁ₛ[μ] E) :
setToL1SCLM α E μ hT f = setToL1SCLM α E μ hT' f :=
setToL1S_congr_left T T' (fun _ _ _ => by rw [h]) f
theorem setToL1SCLM_congr_left' (hT : DominatedFinMeasAdditive μ T C)
(hT' : DominatedFinMeasAdditive μ T' C') (h : ∀ s, MeasurableSet s → μ s < ∞ → T s = T' s)
(f : α →₁ₛ[μ] E) : setToL1SCLM α E μ hT f = setToL1SCLM α E μ hT' f :=
setToL1S_congr_left T T' h f
theorem setToL1SCLM_congr_measure {μ' : Measure α} (hT : DominatedFinMeasAdditive μ T C)
(hT' : DominatedFinMeasAdditive μ' T C') (hμ : μ ≪ μ') (f : α →₁ₛ[μ] E) (f' : α →₁ₛ[μ'] E)
(h : (f : α → E) =ᵐ[μ] f') : setToL1SCLM α E μ hT f = setToL1SCLM α E μ' hT' f' :=
setToL1S_congr_measure T (fun _ => hT.eq_zero_of_measure_zero) hT.1 hμ _ _ h
theorem setToL1SCLM_add_left (hT : DominatedFinMeasAdditive μ T C)
(hT' : DominatedFinMeasAdditive μ T' C') (f : α →₁ₛ[μ] E) :
setToL1SCLM α E μ (hT.add hT') f = setToL1SCLM α E μ hT f + setToL1SCLM α E μ hT' f :=
setToL1S_add_left T T' f
theorem setToL1SCLM_add_left' (hT : DominatedFinMeasAdditive μ T C)
(hT' : DominatedFinMeasAdditive μ T' C') (hT'' : DominatedFinMeasAdditive μ T'' C'')
(h_add : ∀ s, MeasurableSet s → μ s < ∞ → T'' s = T s + T' s) (f : α →₁ₛ[μ] E) :
setToL1SCLM α E μ hT'' f = setToL1SCLM α E μ hT f + setToL1SCLM α E μ hT' f :=
setToL1S_add_left' T T' T'' h_add f
theorem setToL1SCLM_smul_left (c : ℝ) (hT : DominatedFinMeasAdditive μ T C) (f : α →₁ₛ[μ] E) :
setToL1SCLM α E μ (hT.smul c) f = c • setToL1SCLM α E μ hT f :=
setToL1S_smul_left T c f
theorem setToL1SCLM_smul_left' (c : ℝ) (hT : DominatedFinMeasAdditive μ T C)
(hT' : DominatedFinMeasAdditive μ T' C')
(h_smul : ∀ s, MeasurableSet s → μ s < ∞ → T' s = c • T s) (f : α →₁ₛ[μ] E) :
setToL1SCLM α E μ hT' f = c • setToL1SCLM α E μ hT f :=
setToL1S_smul_left' T T' c h_smul f
theorem norm_setToL1SCLM_le {T : Set α → E →L[ℝ] F} {C : ℝ} (hT : DominatedFinMeasAdditive μ T C)
(hC : 0 ≤ C) : ‖setToL1SCLM α E μ hT‖ ≤ C :=
LinearMap.mkContinuous_norm_le _ hC _
theorem norm_setToL1SCLM_le' {T : Set α → E →L[ℝ] F} {C : ℝ} (hT : DominatedFinMeasAdditive μ T C) :
‖setToL1SCLM α E μ hT‖ ≤ max C 0 :=
LinearMap.mkContinuous_norm_le' _ _
theorem setToL1SCLM_const [IsFiniteMeasure μ] {T : Set α → E →L[ℝ] F} {C : ℝ}
(hT : DominatedFinMeasAdditive μ T C) (x : E) :
setToL1SCLM α E μ hT (simpleFunc.indicatorConst 1 MeasurableSet.univ (measure_ne_top μ _) x) =
T univ x :=
setToL1S_const (fun _ => hT.eq_zero_of_measure_zero) hT.1 x
section Order
variable {G' G'' : Type*}
[NormedAddCommGroup G''] [PartialOrder G''] [IsOrderedAddMonoid G''] [NormedSpace ℝ G'']
[NormedAddCommGroup G'] [PartialOrder G'] [IsOrderedAddMonoid G'] [NormedSpace ℝ G']
theorem setToL1SCLM_mono_left {T T' : Set α → E →L[ℝ] G''} {C C' : ℝ}
(hT : DominatedFinMeasAdditive μ T C) (hT' : DominatedFinMeasAdditive μ T' C')
(hTT' : ∀ s x, T s x ≤ T' s x) (f : α →₁ₛ[μ] E) :
setToL1SCLM α E μ hT f ≤ setToL1SCLM α E μ hT' f :=
SimpleFunc.setToSimpleFunc_mono_left T T' hTT' _
theorem setToL1SCLM_mono_left' {T T' : Set α → E →L[ℝ] G''} {C C' : ℝ}
(hT : DominatedFinMeasAdditive μ T C) (hT' : DominatedFinMeasAdditive μ T' C')
(hTT' : ∀ s, MeasurableSet s → μ s < ∞ → ∀ x, T s x ≤ T' s x) (f : α →₁ₛ[μ] E) :
setToL1SCLM α E μ hT f ≤ setToL1SCLM α E μ hT' f :=
SimpleFunc.setToSimpleFunc_mono_left' T T' hTT' _ (SimpleFunc.integrable f)
omit [IsOrderedAddMonoid G'] in
theorem setToL1SCLM_nonneg {T : Set α → G' →L[ℝ] G''} {C : ℝ} (hT : DominatedFinMeasAdditive μ T C)
(hT_nonneg : ∀ s, MeasurableSet s → μ s < ∞ → ∀ x, 0 ≤ x → 0 ≤ T s x) {f : α →₁ₛ[μ] G'}
(hf : 0 ≤ f) : 0 ≤ setToL1SCLM α G' μ hT f :=
setToL1S_nonneg (fun _ => hT.eq_zero_of_measure_zero) hT.1 hT_nonneg hf
theorem setToL1SCLM_mono {T : Set α → G' →L[ℝ] G''} {C : ℝ} (hT : DominatedFinMeasAdditive μ T C)
(hT_nonneg : ∀ s, MeasurableSet s → μ s < ∞ → ∀ x, 0 ≤ x → 0 ≤ T s x) {f g : α →₁ₛ[μ] G'}
(hfg : f ≤ g) : setToL1SCLM α G' μ hT f ≤ setToL1SCLM α G' μ hT g :=
setToL1S_mono (fun _ => hT.eq_zero_of_measure_zero) hT.1 hT_nonneg hfg
end Order
end SetToL1S
end SimpleFunc
open SimpleFunc
section SetToL1
attribute [local instance] Lp.simpleFunc.module
attribute [local instance] Lp.simpleFunc.normedSpace
variable (𝕜) [NontriviallyNormedField 𝕜] [NormedSpace 𝕜 E] [NormedSpace 𝕜 F] [CompleteSpace F]
{T T' T'' : Set α → E →L[ℝ] F} {C C' C'' : ℝ}
/-- Extend `Set α → (E →L[ℝ] F)` to `(α →₁[μ] E) →L[𝕜] F`. -/
def setToL1' (hT : DominatedFinMeasAdditive μ T C)
(h_smul : ∀ c : 𝕜, ∀ s x, T s (c • x) = c • T s x) : (α →₁[μ] E) →L[𝕜] F :=
(setToL1SCLM' α E 𝕜 μ hT h_smul).extend (coeToLp α E 𝕜) (simpleFunc.denseRange one_ne_top)
simpleFunc.isUniformInducing
variable {𝕜}
/-- Extend `Set α → E →L[ℝ] F` to `(α →₁[μ] E) →L[ℝ] F`. -/
def setToL1 (hT : DominatedFinMeasAdditive μ T C) : (α →₁[μ] E) →L[ℝ] F :=
(setToL1SCLM α E μ hT).extend (coeToLp α E ℝ) (simpleFunc.denseRange one_ne_top)
simpleFunc.isUniformInducing
theorem setToL1_eq_setToL1SCLM (hT : DominatedFinMeasAdditive μ T C) (f : α →₁ₛ[μ] E) :
setToL1 hT f = setToL1SCLM α E μ hT f :=
uniformly_extend_of_ind simpleFunc.isUniformInducing (simpleFunc.denseRange one_ne_top)
(setToL1SCLM α E μ hT).uniformContinuous _
theorem setToL1_eq_setToL1' (hT : DominatedFinMeasAdditive μ T C)
(h_smul : ∀ c : 𝕜, ∀ s x, T s (c • x) = c • T s x) (f : α →₁[μ] E) :
setToL1 hT f = setToL1' 𝕜 hT h_smul f :=
rfl
@[simp]
theorem setToL1_zero_left (hT : DominatedFinMeasAdditive μ (0 : Set α → E →L[ℝ] F) C)
(f : α →₁[μ] E) : setToL1 hT f = 0 := by
suffices setToL1 hT = 0 by rw [this]; simp
refine ContinuousLinearMap.extend_unique (setToL1SCLM α E μ hT) _ _ _ _ ?_
ext1 f
rw [setToL1SCLM_zero_left hT f, ContinuousLinearMap.zero_comp, ContinuousLinearMap.zero_apply]
theorem setToL1_zero_left' (hT : DominatedFinMeasAdditive μ T C)
(h_zero : ∀ s, MeasurableSet s → μ s < ∞ → T s = 0) (f : α →₁[μ] E) : setToL1 hT f = 0 := by
suffices setToL1 hT = 0 by rw [this]; simp
refine ContinuousLinearMap.extend_unique (setToL1SCLM α E μ hT) _ _ _ _ ?_
ext1 f
rw [setToL1SCLM_zero_left' hT h_zero f, ContinuousLinearMap.zero_comp,
ContinuousLinearMap.zero_apply]
theorem setToL1_congr_left (T T' : Set α → E →L[ℝ] F) {C C' : ℝ}
(hT : DominatedFinMeasAdditive μ T C) (hT' : DominatedFinMeasAdditive μ T' C') (h : T = T')
(f : α →₁[μ] E) : setToL1 hT f = setToL1 hT' f := by
suffices setToL1 hT = setToL1 hT' by rw [this]
refine ContinuousLinearMap.extend_unique (setToL1SCLM α E μ hT) _ _ _ _ ?_
ext1 f
suffices setToL1 hT' f = setToL1SCLM α E μ hT f by rw [← this]; simp [coeToLp]
rw [setToL1_eq_setToL1SCLM]
exact setToL1SCLM_congr_left hT' hT h.symm f
theorem setToL1_congr_left' (T T' : Set α → E →L[ℝ] F) {C C' : ℝ}
(hT : DominatedFinMeasAdditive μ T C) (hT' : DominatedFinMeasAdditive μ T' C')
(h : ∀ s, MeasurableSet s → μ s < ∞ → T s = T' s) (f : α →₁[μ] E) :
setToL1 hT f = setToL1 hT' f := by
suffices setToL1 hT = setToL1 hT' by rw [this]
refine ContinuousLinearMap.extend_unique (setToL1SCLM α E μ hT) _ _ _ _ ?_
ext1 f
suffices setToL1 hT' f = setToL1SCLM α E μ hT f by rw [← this]; simp [coeToLp]
rw [setToL1_eq_setToL1SCLM]
exact (setToL1SCLM_congr_left' hT hT' h f).symm
theorem setToL1_add_left (hT : DominatedFinMeasAdditive μ T C)
(hT' : DominatedFinMeasAdditive μ T' C') (f : α →₁[μ] E) :
setToL1 (hT.add hT') f = setToL1 hT f + setToL1 hT' f := by
suffices setToL1 (hT.add hT') = setToL1 hT + setToL1 hT' by
rw [this, ContinuousLinearMap.add_apply]
refine ContinuousLinearMap.extend_unique (setToL1SCLM α E μ (hT.add hT')) _ _ _ _ ?_
ext1 f
suffices setToL1 hT f + setToL1 hT' f = setToL1SCLM α E μ (hT.add hT') f by
rw [← this]; simp [coeToLp]
rw [setToL1_eq_setToL1SCLM, setToL1_eq_setToL1SCLM, setToL1SCLM_add_left hT hT']
theorem setToL1_add_left' (hT : DominatedFinMeasAdditive μ T C)
(hT' : DominatedFinMeasAdditive μ T' C') (hT'' : DominatedFinMeasAdditive μ T'' C'')
(h_add : ∀ s, MeasurableSet s → μ s < ∞ → T'' s = T s + T' s) (f : α →₁[μ] E) :
setToL1 hT'' f = setToL1 hT f + setToL1 hT' f := by
suffices setToL1 hT'' = setToL1 hT + setToL1 hT' by rw [this, ContinuousLinearMap.add_apply]
refine ContinuousLinearMap.extend_unique (setToL1SCLM α E μ hT'') _ _ _ _ ?_
ext1 f
suffices setToL1 hT f + setToL1 hT' f = setToL1SCLM α E μ hT'' f by rw [← this]; simp [coeToLp]
rw [setToL1_eq_setToL1SCLM, setToL1_eq_setToL1SCLM,
setToL1SCLM_add_left' hT hT' hT'' h_add]
theorem setToL1_smul_left (hT : DominatedFinMeasAdditive μ T C) (c : ℝ) (f : α →₁[μ] E) :
setToL1 (hT.smul c) f = c • setToL1 hT f := by
suffices setToL1 (hT.smul c) = c • setToL1 hT by rw [this, ContinuousLinearMap.smul_apply]
refine ContinuousLinearMap.extend_unique (setToL1SCLM α E μ (hT.smul c)) _ _ _ _ ?_
ext1 f
suffices c • setToL1 hT f = setToL1SCLM α E μ (hT.smul c) f by rw [← this]; simp [coeToLp]
rw [setToL1_eq_setToL1SCLM, setToL1SCLM_smul_left c hT]
theorem setToL1_smul_left' (hT : DominatedFinMeasAdditive μ T C)
(hT' : DominatedFinMeasAdditive μ T' C') (c : ℝ)
(h_smul : ∀ s, MeasurableSet s → μ s < ∞ → T' s = c • T s) (f : α →₁[μ] E) :
setToL1 hT' f = c • setToL1 hT f := by
suffices setToL1 hT' = c • setToL1 hT by rw [this, ContinuousLinearMap.smul_apply]
refine ContinuousLinearMap.extend_unique (setToL1SCLM α E μ hT') _ _ _ _ ?_
ext1 f
suffices c • setToL1 hT f = setToL1SCLM α E μ hT' f by rw [← this]; simp [coeToLp]
rw [setToL1_eq_setToL1SCLM, setToL1SCLM_smul_left' c hT hT' h_smul]
theorem setToL1_smul (hT : DominatedFinMeasAdditive μ T C)
(h_smul : ∀ c : 𝕜, ∀ s x, T s (c • x) = c • T s x) (c : 𝕜) (f : α →₁[μ] E) :
setToL1 hT (c • f) = c • setToL1 hT f := by
rw [setToL1_eq_setToL1' hT h_smul, setToL1_eq_setToL1' hT h_smul]
exact ContinuousLinearMap.map_smul _ _ _
theorem setToL1_simpleFunc_indicatorConst (hT : DominatedFinMeasAdditive μ T C) {s : Set α}
(hs : MeasurableSet s) (hμs : μ s < ∞) (x : E) :
setToL1 hT (simpleFunc.indicatorConst 1 hs hμs.ne x) = T s x := by
rw [setToL1_eq_setToL1SCLM]
exact setToL1S_indicatorConst (fun s => hT.eq_zero_of_measure_zero) hT.1 hs hμs x
theorem setToL1_indicatorConstLp (hT : DominatedFinMeasAdditive μ T C) {s : Set α}
(hs : MeasurableSet s) (hμs : μ s ≠ ∞) (x : E) :
setToL1 hT (indicatorConstLp 1 hs hμs x) = T s x := by
rw [← Lp.simpleFunc.coe_indicatorConst hs hμs x]
exact setToL1_simpleFunc_indicatorConst hT hs hμs.lt_top x
theorem setToL1_const [IsFiniteMeasure μ] (hT : DominatedFinMeasAdditive μ T C) (x : E) :
setToL1 hT (indicatorConstLp 1 MeasurableSet.univ (measure_ne_top _ _) x) = T univ x :=
setToL1_indicatorConstLp hT MeasurableSet.univ (measure_ne_top _ _) x
section Order
variable {G' G'' : Type*}
[NormedAddCommGroup G''] [PartialOrder G''] [OrderClosedTopology G''] [IsOrderedAddMonoid G'']
[NormedSpace ℝ G''] [CompleteSpace G'']
[NormedAddCommGroup G'] [PartialOrder G'] [NormedSpace ℝ G']
theorem setToL1_mono_left' {T T' : Set α → E →L[ℝ] G''} {C C' : ℝ}
(hT : DominatedFinMeasAdditive μ T C) (hT' : DominatedFinMeasAdditive μ T' C')
(hTT' : ∀ s, MeasurableSet s → μ s < ∞ → ∀ x, T s x ≤ T' s x) (f : α →₁[μ] E) :
setToL1 hT f ≤ setToL1 hT' f := by
induction f using Lp.induction (hp_ne_top := one_ne_top) with
| @indicatorConst c s hs hμs =>
rw [setToL1_simpleFunc_indicatorConst hT hs hμs, setToL1_simpleFunc_indicatorConst hT' hs hμs]
exact hTT' s hs hμs c
| @add f g hf hg _ hf_le hg_le =>
rw [(setToL1 hT).map_add, (setToL1 hT').map_add]
exact add_le_add hf_le hg_le
| isClosed => exact isClosed_le (setToL1 hT).continuous (setToL1 hT').continuous
theorem setToL1_mono_left {T T' : Set α → E →L[ℝ] G''} {C C' : ℝ}
(hT : DominatedFinMeasAdditive μ T C) (hT' : DominatedFinMeasAdditive μ T' C')
(hTT' : ∀ s x, T s x ≤ T' s x) (f : α →₁[μ] E) : setToL1 hT f ≤ setToL1 hT' f :=
setToL1_mono_left' hT hT' (fun s _ _ x => hTT' s x) f
theorem setToL1_nonneg {T : Set α → G' →L[ℝ] G''} {C : ℝ} (hT : DominatedFinMeasAdditive μ T C)
(hT_nonneg : ∀ s, MeasurableSet s → μ s < ∞ → ∀ x, 0 ≤ x → 0 ≤ T s x) {f : α →₁[μ] G'}
(hf : 0 ≤ f) : 0 ≤ setToL1 hT f := by
suffices ∀ f : { g : α →₁[μ] G' // 0 ≤ g }, 0 ≤ setToL1 hT f from
this (⟨f, hf⟩ : { g : α →₁[μ] G' // 0 ≤ g })
refine fun g =>
@isClosed_property { g : α →₁ₛ[μ] G' // 0 ≤ g } { g : α →₁[μ] G' // 0 ≤ g } _ _
(fun g => 0 ≤ setToL1 hT g)
(denseRange_coeSimpleFuncNonnegToLpNonneg 1 μ G' one_ne_top) ?_ ?_ g
· exact isClosed_le continuous_zero ((setToL1 hT).continuous.comp continuous_induced_dom)
· intro g
have : (coeSimpleFuncNonnegToLpNonneg 1 μ G' g : α →₁[μ] G') = (g : α →₁ₛ[μ] G') := rfl
rw [this, setToL1_eq_setToL1SCLM]
exact setToL1S_nonneg (fun s => hT.eq_zero_of_measure_zero) hT.1 hT_nonneg g.2
theorem setToL1_mono [IsOrderedAddMonoid G']
{T : Set α → G' →L[ℝ] G''} {C : ℝ} (hT : DominatedFinMeasAdditive μ T C)
(hT_nonneg : ∀ s, MeasurableSet s → μ s < ∞ → ∀ x, 0 ≤ x → 0 ≤ T s x) {f g : α →₁[μ] G'}
(hfg : f ≤ g) : setToL1 hT f ≤ setToL1 hT g := by
rw [← sub_nonneg] at hfg ⊢
rw [← (setToL1 hT).map_sub]
exact setToL1_nonneg hT hT_nonneg hfg
end Order
theorem norm_setToL1_le_norm_setToL1SCLM (hT : DominatedFinMeasAdditive μ T C) :
‖setToL1 hT‖ ≤ ‖setToL1SCLM α E μ hT‖ :=
calc
‖setToL1 hT‖ ≤ (1 : ℝ≥0) * ‖setToL1SCLM α E μ hT‖ := by
refine
ContinuousLinearMap.opNorm_extend_le (setToL1SCLM α E μ hT) (coeToLp α E ℝ)
(simpleFunc.denseRange one_ne_top) fun x => le_of_eq ?_
rw [NNReal.coe_one, one_mul]
simp [coeToLp]
_ = ‖setToL1SCLM α E μ hT‖ := by rw [NNReal.coe_one, one_mul]
theorem norm_setToL1_le_mul_norm (hT : DominatedFinMeasAdditive μ T C) (hC : 0 ≤ C)
(f : α →₁[μ] E) : ‖setToL1 hT f‖ ≤ C * ‖f‖ :=
calc
‖setToL1 hT f‖ ≤ ‖setToL1SCLM α E μ hT‖ * ‖f‖ :=
ContinuousLinearMap.le_of_opNorm_le _ (norm_setToL1_le_norm_setToL1SCLM hT) _
_ ≤ C * ‖f‖ := mul_le_mul (norm_setToL1SCLM_le hT hC) le_rfl (norm_nonneg _) hC
theorem norm_setToL1_le_mul_norm' (hT : DominatedFinMeasAdditive μ T C) (f : α →₁[μ] E) :
‖setToL1 hT f‖ ≤ max C 0 * ‖f‖ :=
calc
‖setToL1 hT f‖ ≤ ‖setToL1SCLM α E μ hT‖ * ‖f‖ :=
ContinuousLinearMap.le_of_opNorm_le _ (norm_setToL1_le_norm_setToL1SCLM hT) _
_ ≤ max C 0 * ‖f‖ :=
mul_le_mul (norm_setToL1SCLM_le' hT) le_rfl (norm_nonneg _) (le_max_right _ _)
theorem norm_setToL1_le (hT : DominatedFinMeasAdditive μ T C) (hC : 0 ≤ C) : ‖setToL1 hT‖ ≤ C :=
ContinuousLinearMap.opNorm_le_bound _ hC (norm_setToL1_le_mul_norm hT hC)
theorem norm_setToL1_le' (hT : DominatedFinMeasAdditive μ T C) : ‖setToL1 hT‖ ≤ max C 0 :=
ContinuousLinearMap.opNorm_le_bound _ (le_max_right _ _) (norm_setToL1_le_mul_norm' hT)
theorem setToL1_lipschitz (hT : DominatedFinMeasAdditive μ T C) :
LipschitzWith (Real.toNNReal C) (setToL1 hT) :=
(setToL1 hT).lipschitz.weaken (norm_setToL1_le' hT)
/-- If `fs i → f` in `L1`, then `setToL1 hT (fs i) → setToL1 hT f`. -/
theorem tendsto_setToL1 (hT : DominatedFinMeasAdditive μ T C) (f : α →₁[μ] E) {ι}
(fs : ι → α →₁[μ] E) {l : Filter ι} (hfs : Tendsto fs l (𝓝 f)) :
Tendsto (fun i => setToL1 hT (fs i)) l (𝓝 <| setToL1 hT f) :=
((setToL1 hT).continuous.tendsto _).comp hfs
end SetToL1
end L1
section Function
variable [CompleteSpace F] {T T' T'' : Set α → E →L[ℝ] F} {C C' C'' : ℝ} {f g : α → E}
variable (μ T)
open Classical in
/-- Extend `T : Set α → E →L[ℝ] F` to `(α → E) → F` (for integrable functions `α → E`). We set it to
0 if the function is not integrable. -/
def setToFun (hT : DominatedFinMeasAdditive μ T C) (f : α → E) : F :=
if hf : Integrable f μ then L1.setToL1 hT (hf.toL1 f) else 0
variable {μ T}
theorem setToFun_eq (hT : DominatedFinMeasAdditive μ T C) (hf : Integrable f μ) :
setToFun μ T hT f = L1.setToL1 hT (hf.toL1 f) :=
dif_pos hf
theorem L1.setToFun_eq_setToL1 (hT : DominatedFinMeasAdditive μ T C) (f : α →₁[μ] E) :
setToFun μ T hT f = L1.setToL1 hT f := by
rw [setToFun_eq hT (L1.integrable_coeFn f), Integrable.toL1_coeFn]
theorem setToFun_undef (hT : DominatedFinMeasAdditive μ T C) (hf : ¬Integrable f μ) :
setToFun μ T hT f = 0 :=
dif_neg hf
theorem setToFun_non_aestronglyMeasurable (hT : DominatedFinMeasAdditive μ T C)
| (hf : ¬AEStronglyMeasurable f μ) : setToFun μ T hT f = 0 :=
setToFun_undef hT (not_and_of_not_left _ hf)
@[deprecated (since := "2025-04-09")]
| Mathlib/MeasureTheory/Integral/SetToL1.lean | 634 | 637 |
/-
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)
theorem val_lt {n : ℕ} [NeZero n] (a : ZMod n) : a.val < n := by
cases n
· cases NeZero.ne 0 rfl
exact Fin.is_lt a
theorem val_le {n : ℕ} [NeZero n] (a : ZMod n) : a.val ≤ n :=
a.val_lt.le
@[simp]
theorem val_zero : ∀ {n}, (0 : ZMod n).val = 0
| 0 => rfl
| _ + 1 => rfl
@[simp]
theorem val_one' : (1 : ZMod 0).val = 1 :=
rfl
@[simp]
theorem val_neg' {n : ZMod 0} : (-n).val = n.val :=
Int.natAbs_neg n
@[simp]
theorem val_mul' {m n : ZMod 0} : (m * n).val = m.val * n.val :=
Int.natAbs_mul m n
@[simp]
theorem val_natCast (n a : ℕ) : (a : ZMod n).val = a % n := by
cases n
· rw [Nat.mod_zero]
exact Int.natAbs_natCast a
· apply Fin.val_natCast
lemma val_natCast_of_lt {n a : ℕ} (h : a < n) : (a : ZMod n).val = a := by
rwa [val_natCast, Nat.mod_eq_of_lt]
lemma val_ofNat (n a : ℕ) [a.AtLeastTwo] : (ofNat(a) : ZMod n).val = ofNat(a) % n := val_natCast ..
lemma val_ofNat_of_lt {n a : ℕ} [a.AtLeastTwo] (han : a < n) : (ofNat(a) : ZMod n).val = ofNat(a) :=
val_natCast_of_lt han
theorem val_unit' {n : ZMod 0} : IsUnit n ↔ n.val = 1 := by
simp only [val]
rw [Int.isUnit_iff, Int.natAbs_eq_iff, Nat.cast_one]
lemma eq_one_of_isUnit_natCast {n : ℕ} (h : IsUnit (n : ZMod 0)) : n = 1 := by
rw [← Nat.mod_zero n, ← val_natCast, val_unit'.mp h]
instance charP (n : ℕ) : CharP (ZMod n) n where
cast_eq_zero_iff := by
intro k
rcases n with - | n
· simp [zero_dvd_iff, Int.natCast_eq_zero]
· exact Fin.natCast_eq_zero
@[simp]
theorem addOrderOf_one (n : ℕ) : addOrderOf (1 : ZMod n) = n :=
CharP.eq _ (CharP.addOrderOf_one _) (ZMod.charP n)
/-- This lemma works in the case in which `ZMod n` is not infinite, i.e. `n ≠ 0`. The version
where `a ≠ 0` is `addOrderOf_coe'`. -/
@[simp]
theorem addOrderOf_coe (a : ℕ) {n : ℕ} (n0 : n ≠ 0) : addOrderOf (a : ZMod n) = n / n.gcd a := by
rcases a with - | a
· simp only [Nat.cast_zero, addOrderOf_zero, Nat.gcd_zero_right,
Nat.pos_of_ne_zero n0, Nat.div_self]
rw [← Nat.smul_one_eq_cast, addOrderOf_nsmul' _ a.succ_ne_zero, ZMod.addOrderOf_one]
/-- This lemma works in the case in which `a ≠ 0`. The version where
`ZMod n` is not infinite, i.e. `n ≠ 0`, is `addOrderOf_coe`. -/
@[simp]
theorem addOrderOf_coe' {a : ℕ} (n : ℕ) (a0 : a ≠ 0) : addOrderOf (a : ZMod n) = n / n.gcd a := by
rw [← Nat.smul_one_eq_cast, addOrderOf_nsmul' _ a0, ZMod.addOrderOf_one]
/-- We have that `ringChar (ZMod n) = n`. -/
theorem ringChar_zmod_n (n : ℕ) : ringChar (ZMod n) = n := by
rw [ringChar.eq_iff]
exact ZMod.charP n
theorem natCast_self (n : ℕ) : (n : ZMod n) = 0 :=
CharP.cast_eq_zero (ZMod n) n
@[simp]
theorem natCast_self' (n : ℕ) : (n + 1 : ZMod (n + 1)) = 0 := by
rw [← Nat.cast_add_one, natCast_self (n + 1)]
section UniversalProperty
variable {n : ℕ} {R : Type*}
section
variable [AddGroupWithOne R]
/-- Cast an integer modulo `n` to another semiring.
This function is a morphism if the characteristic of `R` divides `n`.
See `ZMod.castHom` for a bundled version. -/
def cast : ∀ {n : ℕ}, ZMod n → R
| 0 => Int.cast
| _ + 1 => fun i => i.val
@[simp]
theorem cast_zero : (cast (0 : ZMod n) : R) = 0 := by
delta ZMod.cast
cases n
· exact Int.cast_zero
· simp
theorem cast_eq_val [NeZero n] (a : ZMod n) : (cast a : R) = a.val := by
cases n
· cases NeZero.ne 0 rfl
rfl
variable {S : Type*} [AddGroupWithOne S]
@[simp]
theorem _root_.Prod.fst_zmod_cast (a : ZMod n) : (cast a : R × S).fst = cast a := by
cases n
· rfl
· simp [ZMod.cast]
@[simp]
theorem _root_.Prod.snd_zmod_cast (a : ZMod n) : (cast a : R × S).snd = cast a := by
cases n
· rfl
· simp [ZMod.cast]
end
/-- So-named because the coercion is `Nat.cast` into `ZMod`. For `Nat.cast` into an arbitrary ring,
see `ZMod.natCast_val`. -/
theorem natCast_zmod_val {n : ℕ} [NeZero n] (a : ZMod n) : (a.val : ZMod n) = a := by
cases n
· cases NeZero.ne 0 rfl
· apply Fin.cast_val_eq_self
theorem natCast_rightInverse [NeZero n] : Function.RightInverse val ((↑) : ℕ → ZMod n) :=
natCast_zmod_val
theorem natCast_zmod_surjective [NeZero n] : Function.Surjective ((↑) : ℕ → ZMod n) :=
natCast_rightInverse.surjective
/-- So-named because the outer coercion is `Int.cast` into `ZMod`. For `Int.cast` into an arbitrary
ring, see `ZMod.intCast_cast`. -/
@[norm_cast]
theorem intCast_zmod_cast (a : ZMod n) : ((cast a : ℤ) : ZMod n) = a := by
cases n
· simp [ZMod.cast, ZMod]
· dsimp [ZMod.cast]
rw [Int.cast_natCast, natCast_zmod_val]
theorem intCast_rightInverse : Function.RightInverse (cast : ZMod n → ℤ) ((↑) : ℤ → ZMod n) :=
intCast_zmod_cast
theorem intCast_surjective : Function.Surjective ((↑) : ℤ → ZMod n) :=
intCast_rightInverse.surjective
lemma «forall» {P : ZMod n → Prop} : (∀ x, P x) ↔ ∀ x : ℤ, P x := intCast_surjective.forall
lemma «exists» {P : ZMod n → Prop} : (∃ x, P x) ↔ ∃ x : ℤ, P x := intCast_surjective.exists
theorem cast_id : ∀ (n) (i : ZMod n), (ZMod.cast i : ZMod n) = i
| 0, _ => Int.cast_id
| _ + 1, i => natCast_zmod_val i
@[simp]
theorem cast_id' : (ZMod.cast : ZMod n → ZMod n) = id :=
funext (cast_id n)
variable (R) [Ring R]
/-- The coercions are respectively `Nat.cast` and `ZMod.cast`. -/
@[simp]
theorem natCast_comp_val [NeZero n] : ((↑) : ℕ → R) ∘ (val : ZMod n → ℕ) = cast := by
cases n
· cases NeZero.ne 0 rfl
rfl
/-- The coercions are respectively `Int.cast`, `ZMod.cast`, and `ZMod.cast`. -/
@[simp]
theorem intCast_comp_cast : ((↑) : ℤ → R) ∘ (cast : ZMod n → ℤ) = cast := by
cases n
· exact congr_arg (Int.cast ∘ ·) ZMod.cast_id'
· ext
simp [ZMod, ZMod.cast]
variable {R}
@[simp]
theorem natCast_val [NeZero n] (i : ZMod n) : (i.val : R) = cast i :=
congr_fun (natCast_comp_val R) i
@[simp]
theorem intCast_cast (i : ZMod n) : ((cast i : ℤ) : R) = cast i :=
congr_fun (intCast_comp_cast R) i
theorem cast_add_eq_ite {n : ℕ} (a b : ZMod n) :
(cast (a + b) : ℤ) =
if (n : ℤ) ≤ cast a + cast b then (cast a + cast b - n : ℤ) else cast a + cast b := by
rcases n with - | n
· simp; rfl
change Fin (n + 1) at a b
change ((((a + b) : Fin (n + 1)) : ℕ) : ℤ) = if ((n + 1 : ℕ) : ℤ) ≤ (a : ℕ) + b then _ else _
simp only [Fin.val_add_eq_ite, Int.natCast_succ, Int.ofNat_le]
norm_cast
split_ifs with h
· rw [Nat.cast_sub h]
congr
· rfl
section CharDvd
/-! If the characteristic of `R` divides `n`, then `cast` is a homomorphism. -/
variable {m : ℕ} [CharP R m]
@[simp]
theorem cast_one (h : m ∣ n) : (cast (1 : ZMod n) : R) = 1 := by
rcases n with - | n
· exact Int.cast_one
show ((1 % (n + 1) : ℕ) : R) = 1
cases n
· rw [Nat.dvd_one] at h
subst m
subsingleton [CharP.CharOne.subsingleton]
rw [Nat.mod_eq_of_lt]
· exact Nat.cast_one
exact Nat.lt_of_sub_eq_succ rfl
theorem cast_add (h : m ∣ n) (a b : ZMod n) : (cast (a + b : ZMod n) : R) = cast a + cast b := by
cases n
· apply Int.cast_add
symm
dsimp [ZMod, ZMod.cast, ZMod.val]
rw [← Nat.cast_add, Fin.val_add, ← sub_eq_zero, ← Nat.cast_sub (Nat.mod_le _ _),
@CharP.cast_eq_zero_iff R _ m]
exact h.trans (Nat.dvd_sub_mod _)
theorem cast_mul (h : m ∣ n) (a b : ZMod n) : (cast (a * b : ZMod n) : R) = cast a * cast b := by
cases n
· apply Int.cast_mul
symm
dsimp [ZMod, ZMod.cast, ZMod.val]
rw [← Nat.cast_mul, Fin.val_mul, ← sub_eq_zero, ← Nat.cast_sub (Nat.mod_le _ _),
@CharP.cast_eq_zero_iff R _ m]
exact h.trans (Nat.dvd_sub_mod _)
/-- The canonical ring homomorphism from `ZMod n` to a ring of characteristic dividing `n`.
See also `ZMod.lift` for a generalized version working in `AddGroup`s.
-/
def castHom (h : m ∣ n) (R : Type*) [Ring R] [CharP R m] : ZMod n →+* R where
toFun := cast
map_zero' := cast_zero
map_one' := cast_one h
map_add' := cast_add h
map_mul' := cast_mul h
@[simp]
theorem castHom_apply {h : m ∣ n} (i : ZMod n) : castHom h R i = cast i :=
rfl
@[simp]
theorem cast_sub (h : m ∣ n) (a b : ZMod n) : (cast (a - b : ZMod n) : R) = cast a - cast b :=
(castHom h R).map_sub a b
@[simp]
theorem cast_neg (h : m ∣ n) (a : ZMod n) : (cast (-a : ZMod n) : R) = -(cast a) :=
(castHom h R).map_neg a
@[simp]
theorem cast_pow (h : m ∣ n) (a : ZMod n) (k : ℕ) : (cast (a ^ k : ZMod n) : R) = (cast a) ^ k :=
(castHom h R).map_pow a k
@[simp, norm_cast]
theorem cast_natCast (h : m ∣ n) (k : ℕ) : (cast (k : ZMod n) : R) = k :=
map_natCast (castHom h R) k
@[simp, norm_cast]
theorem cast_intCast (h : m ∣ n) (k : ℤ) : (cast (k : ZMod n) : R) = k :=
map_intCast (castHom h R) k
end CharDvd
section CharEq
/-! Some specialised simp lemmas which apply when `R` has characteristic `n`. -/
variable [CharP R n]
@[simp]
theorem cast_one' : (cast (1 : ZMod n) : R) = 1 :=
cast_one dvd_rfl
@[simp]
theorem cast_add' (a b : ZMod n) : (cast (a + b : ZMod n) : R) = cast a + cast b :=
cast_add dvd_rfl a b
@[simp]
theorem cast_mul' (a b : ZMod n) : (cast (a * b : ZMod n) : R) = cast a * cast b :=
cast_mul dvd_rfl a b
@[simp]
theorem cast_sub' (a b : ZMod n) : (cast (a - b : ZMod n) : R) = cast a - cast b :=
cast_sub dvd_rfl a b
@[simp]
theorem cast_pow' (a : ZMod n) (k : ℕ) : (cast (a ^ k : ZMod n) : R) = (cast a : R) ^ k :=
cast_pow dvd_rfl a k
@[simp, norm_cast]
theorem cast_natCast' (k : ℕ) : (cast (k : ZMod n) : R) = k :=
cast_natCast dvd_rfl k
@[simp, norm_cast]
theorem cast_intCast' (k : ℤ) : (cast (k : ZMod n) : R) = k :=
cast_intCast dvd_rfl k
variable (R)
theorem castHom_injective : Function.Injective (ZMod.castHom (dvd_refl n) R) := by
rw [injective_iff_map_eq_zero]
intro x
obtain ⟨k, rfl⟩ := ZMod.intCast_surjective x
rw [map_intCast, CharP.intCast_eq_zero_iff R n, CharP.intCast_eq_zero_iff (ZMod n) n]
exact id
theorem castHom_bijective [Fintype R] (h : Fintype.card R = n) :
Function.Bijective (ZMod.castHom (dvd_refl n) R) := by
haveI : NeZero n :=
⟨by
intro hn
rw [hn] at h
exact (Fintype.card_eq_zero_iff.mp h).elim' 0⟩
rw [Fintype.bijective_iff_injective_and_card, ZMod.card, h, eq_self_iff_true, and_true]
apply ZMod.castHom_injective
/-- The unique ring isomorphism between `ZMod n` and a ring `R`
of characteristic `n` and cardinality `n`. -/
noncomputable def ringEquiv [Fintype R] (h : Fintype.card R = n) : ZMod n ≃+* R :=
RingEquiv.ofBijective _ (ZMod.castHom_bijective R h)
/-- The unique ring isomorphism between `ZMod p` and a ring `R` of cardinality a prime `p`.
If you need any property of this isomorphism, first of all use `ringEquivOfPrime_eq_ringEquiv`
below (after `have : CharP R p := ...`) and deduce it by the results about `ZMod.ringEquiv`. -/
noncomputable def ringEquivOfPrime [Fintype R] {p : ℕ} (hp : p.Prime) (hR : Fintype.card R = p) :
ZMod p ≃+* R :=
have : Nontrivial R := Fintype.one_lt_card_iff_nontrivial.1 (hR ▸ hp.one_lt)
-- The following line exists as `charP_of_card_eq_prime` in `Mathlib.Algebra.CharP.CharAndCard`.
have : CharP R p := (CharP.charP_iff_prime_eq_zero hp).2 (hR ▸ Nat.cast_card_eq_zero R)
ZMod.ringEquiv R hR
@[simp]
lemma ringEquivOfPrime_eq_ringEquiv [Fintype R] {p : ℕ} [CharP R p] (hp : p.Prime)
(hR : Fintype.card R = p) : ringEquivOfPrime R hp hR = ringEquiv R hR := rfl
/-- The identity between `ZMod m` and `ZMod n` when `m = n`, as a ring isomorphism. -/
def ringEquivCongr {m n : ℕ} (h : m = n) : ZMod m ≃+* ZMod n := by
rcases m with - | m <;> rcases n with - | n
· exact RingEquiv.refl _
· exfalso
exact n.succ_ne_zero h.symm
· exfalso
exact m.succ_ne_zero h
· exact
{ finCongr h with
map_mul' := fun a b => by
dsimp [ZMod]
ext
rw [Fin.coe_cast, Fin.coe_mul, Fin.coe_mul, Fin.coe_cast, Fin.coe_cast, ← h]
map_add' := fun a b => by
dsimp [ZMod]
ext
rw [Fin.coe_cast, Fin.val_add, Fin.val_add, Fin.coe_cast, Fin.coe_cast, ← h] }
@[simp] lemma ringEquivCongr_refl (a : ℕ) : ringEquivCongr (rfl : a = a) = .refl _ := by
cases a <;> rfl
lemma ringEquivCongr_refl_apply {a : ℕ} (x : ZMod a) : ringEquivCongr rfl x = x := by
rw [ringEquivCongr_refl]
rfl
lemma ringEquivCongr_symm {a b : ℕ} (hab : a = b) :
(ringEquivCongr hab).symm = ringEquivCongr hab.symm := by
subst hab
cases a <;> rfl
lemma ringEquivCongr_trans {a b c : ℕ} (hab : a = b) (hbc : b = c) :
(ringEquivCongr hab).trans (ringEquivCongr hbc) = ringEquivCongr (hab.trans hbc) := by
subst hab hbc
cases a <;> rfl
lemma ringEquivCongr_ringEquivCongr_apply {a b c : ℕ} (hab : a = b) (hbc : b = c) (x : ZMod a) :
ringEquivCongr hbc (ringEquivCongr hab x) = ringEquivCongr (hab.trans hbc) x := by
rw [← ringEquivCongr_trans hab hbc]
rfl
lemma ringEquivCongr_val {a b : ℕ} (h : a = b) (x : ZMod a) :
ZMod.val ((ZMod.ringEquivCongr h) x) = ZMod.val x := by
subst h
cases a <;> rfl
lemma ringEquivCongr_intCast {a b : ℕ} (h : a = b) (z : ℤ) :
ZMod.ringEquivCongr h z = z := by
subst h
cases a <;> rfl
end CharEq
end UniversalProperty
variable {m n : ℕ}
@[simp]
theorem val_eq_zero : ∀ {n : ℕ} (a : ZMod n), a.val = 0 ↔ a = 0
| 0, _ => Int.natAbs_eq_zero
| n + 1, a => by
rw [Fin.ext_iff]
exact Iff.rfl
theorem intCast_eq_intCast_iff (a b : ℤ) (c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a ≡ b [ZMOD c] :=
CharP.intCast_eq_intCast (ZMod c) c
theorem intCast_eq_intCast_iff' (a b : ℤ) (c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a % c = b % c :=
ZMod.intCast_eq_intCast_iff a b c
theorem val_intCast {n : ℕ} (a : ℤ) [NeZero n] : ↑(a : ZMod n).val = a % n := by
have hle : (0 : ℤ) ≤ ↑(a : ZMod n).val := Int.natCast_nonneg _
have hlt : ↑(a : ZMod n).val < (n : ℤ) := Int.ofNat_lt.mpr (ZMod.val_lt a)
refine (Int.emod_eq_of_lt hle hlt).symm.trans ?_
rw [← ZMod.intCast_eq_intCast_iff', Int.cast_natCast, ZMod.natCast_val, ZMod.cast_id]
theorem natCast_eq_natCast_iff (a b c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a ≡ b [MOD c] := by
simpa [Int.natCast_modEq_iff] using ZMod.intCast_eq_intCast_iff a b c
theorem natCast_eq_natCast_iff' (a b c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a % c = b % c :=
ZMod.natCast_eq_natCast_iff a b c
theorem intCast_zmod_eq_zero_iff_dvd (a : ℤ) (b : ℕ) : (a : ZMod b) = 0 ↔ (b : ℤ) ∣ a := by
rw [← Int.cast_zero, ZMod.intCast_eq_intCast_iff, Int.modEq_zero_iff_dvd]
theorem intCast_eq_intCast_iff_dvd_sub (a b : ℤ) (c : ℕ) : (a : ZMod c) = ↑b ↔ ↑c ∣ b - a := by
rw [ZMod.intCast_eq_intCast_iff, Int.modEq_iff_dvd]
theorem natCast_zmod_eq_zero_iff_dvd (a b : ℕ) : (a : ZMod b) = 0 ↔ b ∣ a := by
rw [← Nat.cast_zero, ZMod.natCast_eq_natCast_iff, Nat.modEq_zero_iff_dvd]
theorem coe_intCast (a : ℤ) : cast (a : ZMod n) = a % n := by
cases n
· rw [Int.ofNat_zero, Int.emod_zero, Int.cast_id]; rfl
· rw [← val_intCast, val]; rfl
lemma intCast_cast_add (x y : ZMod n) : (cast (x + y) : ℤ) = (cast x + cast y) % n := by
rw [← ZMod.coe_intCast, Int.cast_add, ZMod.intCast_zmod_cast, ZMod.intCast_zmod_cast]
lemma intCast_cast_mul (x y : ZMod n) : (cast (x * y) : ℤ) = cast x * cast y % n := by
rw [← ZMod.coe_intCast, Int.cast_mul, ZMod.intCast_zmod_cast, ZMod.intCast_zmod_cast]
lemma intCast_cast_sub (x y : ZMod n) : (cast (x - y) : ℤ) = (cast x - cast y) % n := by
rw [← ZMod.coe_intCast, Int.cast_sub, ZMod.intCast_zmod_cast, ZMod.intCast_zmod_cast]
lemma intCast_cast_neg (x : ZMod n) : (cast (-x) : ℤ) = -cast x % n := by
rw [← ZMod.coe_intCast, Int.cast_neg, ZMod.intCast_zmod_cast]
@[simp]
theorem val_neg_one (n : ℕ) : (-1 : ZMod n.succ).val = n := by
dsimp [val, Fin.coe_neg]
cases n
· simp [Nat.mod_one]
· dsimp [ZMod, ZMod.cast]
rw [Fin.coe_neg_one]
/-- `-1 : ZMod n` lifts to `n - 1 : R`. This avoids the characteristic assumption in `cast_neg`. -/
theorem cast_neg_one {R : Type*} [Ring R] (n : ℕ) : cast (-1 : ZMod n) = (n - 1 : R) := by
rcases n with - | n
· dsimp [ZMod, ZMod.cast]; simp
· rw [← natCast_val, val_neg_one, Nat.cast_succ, add_sub_cancel_right]
| theorem cast_sub_one {R : Type*} [Ring R] {n : ℕ} (k : ZMod n) :
(cast (k - 1 : ZMod n) : R) = (if k = 0 then (n : R) else cast k) - 1 := by
split_ifs with hk
· rw [hk, zero_sub, ZMod.cast_neg_one]
| Mathlib/Data/ZMod/Basic.lean | 536 | 539 |
/-
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.Star.SelfAdjoint
import Mathlib.LinearAlgebra.Dimension.StrongRankCondition
import Mathlib.LinearAlgebra.FreeModule.Finite.Basic
/-!
# Quaternions
In this file we define quaternions `ℍ[R]` over a commutative ring `R`, and define some
algebraic structures on `ℍ[R]`.
## Main definitions
* `QuaternionAlgebra R a b c`, `ℍ[R, a, b, c]` :
[Bourbaki, *Algebra I*][bourbaki1989] with coefficients `a`, `b`, `c`
(Many other references such as Wikipedia assume $\operatorname{char} R ≠ 2$ therefore one can
complete the square and WLOG assume $b = 0$.)
* `Quaternion R`, `ℍ[R]` : the space of quaternions, a.k.a.
`QuaternionAlgebra R (-1) (0) (-1)`;
* `Quaternion.normSq` : square of the norm of a quaternion;
We also define the following algebraic structures on `ℍ[R]`:
* `Ring ℍ[R, a, b, c]`, `StarRing ℍ[R, a, b, c]`, and `Algebra R ℍ[R, a, b, c]` :
for any commutative ring `R`;
* `Ring ℍ[R]`, `StarRing ℍ[R]`, and `Algebra R ℍ[R]` : for any commutative ring `R`;
* `IsDomain ℍ[R]` : for a linear ordered commutative ring `R`;
* `DivisionRing ℍ[R]` : for a linear ordered field `R`.
## Notation
The following notation is available with `open Quaternion` or `open scoped Quaternion`.
* `ℍ[R, c₁, c₂, c₃]` : `QuaternionAlgebra R c₁ c₂ c₃`
* `ℍ[R, c₁, c₂]` : `QuaternionAlgebra R c₁ 0 c₂`
* `ℍ[R]` : quaternions over `R`.
## Implementation notes
We define quaternions over any ring `R`, not just `ℝ` to be able to deal with, e.g., integer
or rational quaternions without using real numbers. In particular, all definitions in this file
are computable.
## Tags
quaternion
-/
/-- Quaternion algebra over a type with fixed coefficients where $i^2 = a + bi$ and $j^2 = c$,
denoted as `ℍ[R,a,b]`.
Implemented as a structure with four fields: `re`, `imI`, `imJ`, and `imK`. -/
@[ext]
structure QuaternionAlgebra (R : Type*) (a b c : R) where
/-- Real part of a quaternion. -/
re : R
/-- First imaginary part (i) of a quaternion. -/
imI : R
/-- Second imaginary part (j) of a quaternion. -/
imJ : R
/-- Third imaginary part (k) of a quaternion. -/
imK : R
@[inherit_doc]
scoped[Quaternion] notation "ℍ[" R "," a "," b "," c "]" =>
QuaternionAlgebra R a b c
@[inherit_doc]
scoped[Quaternion] notation "ℍ[" R "," a "," b "]" => QuaternionAlgebra R a 0 b
namespace QuaternionAlgebra
open Quaternion
/-- The equivalence between a quaternion algebra over `R` and `R × R × R × R`. -/
@[simps]
def equivProd {R : Type*} (c₁ c₂ c₃ : R) : ℍ[R,c₁,c₂,c₃] ≃ R × R × R × R where
toFun a := ⟨a.1, a.2, a.3, a.4⟩
invFun a := ⟨a.1, a.2.1, a.2.2.1, a.2.2.2⟩
left_inv _ := rfl
right_inv _ := rfl
/-- The equivalence between a quaternion algebra over `R` and `Fin 4 → R`. -/
@[simps symm_apply]
def equivTuple {R : Type*} (c₁ c₂ c₃ : R) : ℍ[R,c₁,c₂,c₃] ≃ (Fin 4 → R) where
toFun a := ![a.1, a.2, a.3, a.4]
invFun a := ⟨a 0, a 1, a 2, a 3⟩
left_inv _ := rfl
right_inv f := by ext ⟨_, _ | _ | _ | _ | _ | ⟨⟩⟩ <;> rfl
@[simp]
theorem equivTuple_apply {R : Type*} (c₁ c₂ c₃ : R) (x : ℍ[R,c₁,c₂,c₃]) :
equivTuple c₁ c₂ c₃ x = ![x.re, x.imI, x.imJ, x.imK] :=
rfl
@[simp]
theorem mk.eta {R : Type*} {c₁ c₂ c₃} (a : ℍ[R,c₁,c₂,c₃]) : mk a.1 a.2 a.3 a.4 = a := rfl
variable {S T R : Type*} {c₁ c₂ c₃ : R} (r x y : R) (a b : ℍ[R,c₁,c₂,c₃])
instance [Subsingleton R] : Subsingleton ℍ[R, c₁, c₂, c₃] := (equivTuple c₁ c₂ c₃).subsingleton
instance [Nontrivial R] : Nontrivial ℍ[R, c₁, c₂, c₃] := (equivTuple c₁ c₂ c₃).surjective.nontrivial
section Zero
variable [Zero R]
/-- The imaginary part of a quaternion.
Note that unless `c₂ = 0`, this definition is not particularly well-behaved;
for instance, `QuaternionAlgebra.star_im` only says that the star of an imaginary quaternion
is imaginary under this condition. -/
def im (x : ℍ[R,c₁,c₂,c₃]) : ℍ[R,c₁,c₂,c₃] :=
⟨0, x.imI, x.imJ, x.imK⟩
@[simp]
theorem im_re : a.im.re = 0 :=
rfl
@[simp]
theorem im_imI : a.im.imI = a.imI :=
rfl
@[simp]
theorem im_imJ : a.im.imJ = a.imJ :=
rfl
@[simp]
theorem im_imK : a.im.imK = a.imK :=
rfl
@[simp]
theorem im_idem : a.im.im = a.im :=
rfl
/-- Coercion `R → ℍ[R,c₁,c₂,c₃]`. -/
@[coe] def coe (x : R) : ℍ[R,c₁,c₂,c₃] := ⟨x, 0, 0, 0⟩
instance : CoeTC R ℍ[R,c₁,c₂,c₃] := ⟨coe⟩
@[simp, norm_cast]
theorem coe_re : (x : ℍ[R,c₁,c₂,c₃]).re = x := rfl
@[simp, norm_cast]
theorem coe_imI : (x : ℍ[R,c₁,c₂,c₃]).imI = 0 := rfl
@[simp, norm_cast]
theorem coe_imJ : (x : ℍ[R,c₁,c₂,c₃]).imJ = 0 := rfl
@[simp, norm_cast]
theorem coe_imK : (x : ℍ[R,c₁,c₂,c₃]).imK = 0 := rfl
theorem coe_injective : Function.Injective (coe : R → ℍ[R,c₁,c₂,c₃]) := fun _ _ h => congr_arg re h
@[simp]
theorem coe_inj {x y : R} : (x : ℍ[R,c₁,c₂,c₃]) = y ↔ x = y :=
coe_injective.eq_iff
-- Porting note: removed `simps`, added simp lemmas manually.
-- Should adjust `simps` to name properly, i.e. as `zero_re` rather than `instZero_zero_re`.
instance : Zero ℍ[R,c₁,c₂,c₃] := ⟨⟨0, 0, 0, 0⟩⟩
@[scoped simp] theorem zero_re : (0 : ℍ[R,c₁,c₂,c₃]).re = 0 := rfl
@[scoped simp] theorem zero_imI : (0 : ℍ[R,c₁,c₂,c₃]).imI = 0 := rfl
@[scoped simp] theorem zero_imJ : (0 : ℍ[R,c₁,c₂,c₃]).imJ = 0 := rfl
@[scoped simp] theorem zero_imK : (0 : ℍ[R,c₁,c₂,c₃]).imK = 0 := rfl
@[scoped simp] theorem zero_im : (0 : ℍ[R,c₁,c₂,c₃]).im = 0 := rfl
@[simp, norm_cast]
theorem coe_zero : ((0 : R) : ℍ[R,c₁,c₂,c₃]) = 0 := rfl
instance : Inhabited ℍ[R,c₁,c₂,c₃] := ⟨0⟩
section One
variable [One R]
-- Porting note: removed `simps`, added simp lemmas manually. Should adjust `simps` to name properly
instance : One ℍ[R,c₁,c₂,c₃] := ⟨⟨1, 0, 0, 0⟩⟩
@[scoped simp] theorem one_re : (1 : ℍ[R,c₁,c₂,c₃]).re = 1 := rfl
@[scoped simp] theorem one_imI : (1 : ℍ[R,c₁,c₂,c₃]).imI = 0 := rfl
@[scoped simp] theorem one_imJ : (1 : ℍ[R,c₁,c₂,c₃]).imJ = 0 := rfl
@[scoped simp] theorem one_imK : (1 : ℍ[R,c₁,c₂,c₃]).imK = 0 := rfl
@[scoped simp] theorem one_im : (1 : ℍ[R,c₁,c₂,c₃]).im = 0 := rfl
@[simp, norm_cast]
theorem coe_one : ((1 : R) : ℍ[R,c₁,c₂,c₃]) = 1 := rfl
end One
end Zero
section Add
variable [Add R]
-- Porting note: removed `simps`, added simp lemmas manually. Should adjust `simps` to name properly
instance : Add ℍ[R,c₁,c₂,c₃] :=
⟨fun a b => ⟨a.1 + b.1, a.2 + b.2, a.3 + b.3, a.4 + b.4⟩⟩
@[simp] theorem add_re : (a + b).re = a.re + b.re := rfl
@[simp] theorem add_imI : (a + b).imI = a.imI + b.imI := rfl
@[simp] theorem add_imJ : (a + b).imJ = a.imJ + b.imJ := rfl
@[simp] theorem add_imK : (a + b).imK = a.imK + b.imK := rfl
@[simp]
theorem mk_add_mk (a₁ a₂ a₃ a₄ b₁ b₂ b₃ b₄ : R) :
(mk a₁ a₂ a₃ a₄ : ℍ[R,c₁,c₂,c₃]) + mk b₁ b₂ b₃ b₄ =
mk (a₁ + b₁) (a₂ + b₂) (a₃ + b₃) (a₄ + b₄) :=
rfl
end Add
section AddZeroClass
variable [AddZeroClass R]
@[simp] theorem add_im : (a + b).im = a.im + b.im :=
QuaternionAlgebra.ext (zero_add _).symm rfl rfl rfl
@[simp, norm_cast]
theorem coe_add : ((x + y : R) : ℍ[R,c₁,c₂,c₃]) = x + y := by ext <;> simp
end AddZeroClass
section Neg
variable [Neg R]
| Mathlib/Algebra/Quaternion.lean | 237 | 237 | |
/-
Copyright (c) 2020 Zhouhang Zhou. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Zhouhang Zhou
-/
import Mathlib.Algebra.Group.Pi.Lemmas
import Mathlib.Algebra.Group.Support
import Mathlib.Data.Set.SymmDiff
/-!
# Indicator function
- `Set.indicator (s : Set α) (f : α → β) (a : α)` is `f a` if `a ∈ s` and is `0` otherwise.
- `Set.mulIndicator (s : Set α) (f : α → β) (a : α)` is `f a` if `a ∈ s` and is `1` otherwise.
## Implementation note
In mathematics, an indicator function or a characteristic function is a function
used to indicate membership of an element in a set `s`,
having the value `1` for all elements of `s` and the value `0` otherwise.
But since it is usually used to restrict a function to a certain set `s`,
we let the indicator function take the value `f x` for some function `f`, instead of `1`.
If the usual indicator function is needed, just set `f` to be the constant function `fun _ ↦ 1`.
The indicator function is implemented non-computably, to avoid having to pass around `Decidable`
arguments. This is in contrast with the design of `Pi.single` or `Set.piecewise`.
## Tags
indicator, characteristic
-/
assert_not_exists MonoidWithZero
open Function
variable {α β M N : Type*}
namespace Set
section One
variable [One M] [One N] {s t : Set α} {f g : α → M} {a : α}
/-- `Set.mulIndicator s f a` is `f a` if `a ∈ s`, `1` otherwise. -/
@[to_additive "`Set.indicator s f a` is `f a` if `a ∈ s`, `0` otherwise."]
noncomputable def mulIndicator (s : Set α) (f : α → M) (x : α) : M :=
haveI := Classical.decPred (· ∈ s)
if x ∈ s then f x else 1
@[to_additive (attr := simp)]
theorem piecewise_eq_mulIndicator [DecidablePred (· ∈ s)] : s.piecewise f 1 = s.mulIndicator f :=
funext fun _ => @if_congr _ _ _ _ (id _) _ _ _ _ Iff.rfl rfl rfl
@[to_additive]
theorem mulIndicator_apply (s : Set α) (f : α → M) (a : α) [Decidable (a ∈ s)] :
mulIndicator s f a = if a ∈ s then f a else 1 := by
unfold mulIndicator
congr
@[to_additive (attr := simp)]
theorem mulIndicator_of_mem (h : a ∈ s) (f : α → M) : mulIndicator s f a = f a :=
if_pos h
@[to_additive (attr := simp)]
theorem mulIndicator_of_not_mem (h : a ∉ s) (f : α → M) : mulIndicator s f a = 1 :=
if_neg h
@[to_additive]
theorem mulIndicator_eq_one_or_self (s : Set α) (f : α → M) (a : α) :
mulIndicator s f a = 1 ∨ mulIndicator s f a = f a := by
by_cases h : a ∈ s
· exact Or.inr (mulIndicator_of_mem h f)
· exact Or.inl (mulIndicator_of_not_mem h f)
@[to_additive (attr := simp)]
theorem mulIndicator_apply_eq_self : s.mulIndicator f a = f a ↔ a ∉ s → f a = 1 :=
letI := Classical.dec (a ∈ s)
ite_eq_left_iff.trans (by rw [@eq_comm _ (f a)])
@[to_additive (attr := simp)]
theorem mulIndicator_eq_self : s.mulIndicator f = f ↔ mulSupport f ⊆ s := by
simp only [funext_iff, subset_def, mem_mulSupport, mulIndicator_apply_eq_self, not_imp_comm]
@[to_additive]
theorem mulIndicator_eq_self_of_superset (h1 : s.mulIndicator f = f) (h2 : s ⊆ t) :
t.mulIndicator f = f := by
rw [mulIndicator_eq_self] at h1 ⊢
exact Subset.trans h1 h2
@[to_additive (attr := simp)]
theorem mulIndicator_apply_eq_one : mulIndicator s f a = 1 ↔ a ∈ s → f a = 1 :=
letI := Classical.dec (a ∈ s)
ite_eq_right_iff
@[to_additive (attr := simp)]
theorem mulIndicator_eq_one : (mulIndicator s f = fun _ => 1) ↔ Disjoint (mulSupport f) s := by
simp only [funext_iff, mulIndicator_apply_eq_one, Set.disjoint_left, mem_mulSupport,
not_imp_not]
@[to_additive (attr := simp)]
theorem mulIndicator_eq_one' : mulIndicator s f = 1 ↔ Disjoint (mulSupport f) s :=
mulIndicator_eq_one
@[to_additive]
theorem mulIndicator_apply_ne_one {a : α} : s.mulIndicator f a ≠ 1 ↔ a ∈ s ∩ mulSupport f := by
simp only [Ne, mulIndicator_apply_eq_one, Classical.not_imp, mem_inter_iff, mem_mulSupport]
@[to_additive (attr := simp)]
theorem mulSupport_mulIndicator :
Function.mulSupport (s.mulIndicator f) = s ∩ Function.mulSupport f :=
ext fun x => by simp [Function.mem_mulSupport, mulIndicator_apply_eq_one]
/-- If a multiplicative indicator function is not equal to `1` at a point, then that point is in the
set. -/
@[to_additive
"If an additive indicator function is not equal to `0` at a point, then that point is
in the set."]
theorem mem_of_mulIndicator_ne_one (h : mulIndicator s f a ≠ 1) : a ∈ s :=
not_imp_comm.1 (fun hn => mulIndicator_of_not_mem hn f) h
/-- See `Set.eqOn_mulIndicator'` for the version with `sᶜ`. -/
@[to_additive
"See `Set.eqOn_indicator'` for the version with `sᶜ`"]
theorem eqOn_mulIndicator : EqOn (mulIndicator s f) f s := fun _ hx => mulIndicator_of_mem hx f
/-- See `Set.eqOn_mulIndicator` for the version with `s`. -/
@[to_additive
"See `Set.eqOn_indicator` for the version with `s`."]
theorem eqOn_mulIndicator' : EqOn (mulIndicator s f) 1 sᶜ :=
fun _ hx => mulIndicator_of_not_mem hx f
@[to_additive]
theorem mulSupport_mulIndicator_subset : mulSupport (s.mulIndicator f) ⊆ s := fun _ hx =>
hx.imp_symm fun h => mulIndicator_of_not_mem h f
@[to_additive (attr := simp)]
theorem mulIndicator_mulSupport : mulIndicator (mulSupport f) f = f :=
mulIndicator_eq_self.2 Subset.rfl
@[to_additive (attr := simp)]
theorem mulIndicator_range_comp {ι : Sort*} (f : ι → α) (g : α → M) :
mulIndicator (range f) g ∘ f = g ∘ f :=
letI := Classical.decPred (· ∈ range f)
piecewise_range_comp _ _ _
@[to_additive]
theorem mulIndicator_congr (h : EqOn f g s) : mulIndicator s f = mulIndicator s g :=
funext fun x => by
simp only [mulIndicator]
split_ifs with h_1
· exact h h_1
rfl
@[to_additive]
theorem mulIndicator_eq_mulIndicator {t : Set β} {g : β → M} {b : β}
(h1 : a ∈ s ↔ b ∈ t) (h2 : f a = g b) :
s.mulIndicator f a = t.mulIndicator g b := by
by_cases a ∈ s <;> simp_all
@[to_additive]
theorem mulIndicator_const_eq_mulIndicator_const {t : Set β} {b : β} {c : M} (h : a ∈ s ↔ b ∈ t) :
s.mulIndicator (fun _ ↦ c) a = t.mulIndicator (fun _ ↦ c) b :=
mulIndicator_eq_mulIndicator h rfl
@[to_additive (attr := simp)]
theorem mulIndicator_univ (f : α → M) : mulIndicator (univ : Set α) f = f :=
mulIndicator_eq_self.2 <| subset_univ _
@[to_additive (attr := simp)]
theorem mulIndicator_empty (f : α → M) : mulIndicator (∅ : Set α) f = fun _ => 1 :=
mulIndicator_eq_one.2 <| disjoint_empty _
@[to_additive]
theorem mulIndicator_empty' (f : α → M) : mulIndicator (∅ : Set α) f = 1 :=
mulIndicator_empty f
variable (M)
@[to_additive (attr := simp)]
theorem mulIndicator_one (s : Set α) : (mulIndicator s fun _ => (1 : M)) = fun _ => (1 : M) :=
mulIndicator_eq_one.2 <| by simp only [mulSupport_one, empty_disjoint]
@[to_additive (attr := simp)]
theorem mulIndicator_one' {s : Set α} : s.mulIndicator (1 : α → M) = 1 :=
mulIndicator_one M s
variable {M}
@[to_additive]
theorem mulIndicator_mulIndicator (s t : Set α) (f : α → M) :
mulIndicator s (mulIndicator t f) = mulIndicator (s ∩ t) f :=
funext fun x => by
simp only [mulIndicator]
split_ifs <;> simp_all +contextual
@[to_additive (attr := simp)]
theorem mulIndicator_inter_mulSupport (s : Set α) (f : α → M) :
mulIndicator (s ∩ mulSupport f) f = mulIndicator s f := by
rw [← mulIndicator_mulIndicator, mulIndicator_mulSupport]
@[to_additive]
theorem comp_mulIndicator (h : M → β) (f : α → M) {s : Set α} {x : α} [DecidablePred (· ∈ s)] :
h (s.mulIndicator f x) = s.piecewise (h ∘ f) (const α (h 1)) x := by
letI := Classical.decPred (· ∈ s)
convert s.apply_piecewise f (const α 1) (fun _ => h) (x := x) using 2
@[to_additive]
theorem mulIndicator_comp_right {s : Set α} (f : β → α) {g : α → M} {x : β} :
mulIndicator (f ⁻¹' s) (g ∘ f) x = mulIndicator s g (f x) := by
simp only [mulIndicator, Function.comp]
split_ifs with h h' h'' <;> first | rfl | contradiction
@[to_additive]
theorem mulIndicator_image {s : Set α} {f : β → M} {g : α → β} (hg : Injective g) {x : α} :
mulIndicator (g '' s) f (g x) = mulIndicator s (f ∘ g) x := by
rw [← mulIndicator_comp_right, preimage_image_eq _ hg]
@[to_additive]
theorem mulIndicator_comp_of_one {g : M → N} (hg : g 1 = 1) :
mulIndicator s (g ∘ f) = g ∘ mulIndicator s f := by
funext
simp only [mulIndicator]
split_ifs <;> simp [*]
@[to_additive]
theorem comp_mulIndicator_const (c : M) (f : M → N) (hf : f 1 = 1) :
(fun x => f (s.mulIndicator (fun _ => c) x)) = s.mulIndicator fun _ => f c :=
(mulIndicator_comp_of_one hf).symm
@[to_additive]
theorem mulIndicator_preimage (s : Set α) (f : α → M) (B : Set M) :
mulIndicator s f ⁻¹' B = s.ite (f ⁻¹' B) (1 ⁻¹' B) :=
letI := Classical.decPred (· ∈ s)
piecewise_preimage s f 1 B
@[to_additive]
theorem mulIndicator_one_preimage (s : Set M) :
t.mulIndicator 1 ⁻¹' s ∈ ({Set.univ, ∅} : Set (Set α)) := by
classical
rw [mulIndicator_one', preimage_one]
split_ifs <;> simp
@[to_additive]
theorem mulIndicator_const_preimage_eq_union (U : Set α) (s : Set M) (a : M) [Decidable (a ∈ s)]
[Decidable ((1 : M) ∈ s)] : (U.mulIndicator fun _ => a) ⁻¹' s =
| (if a ∈ s then U else ∅) ∪ if (1 : M) ∈ s then Uᶜ else ∅ := by
rw [mulIndicator_preimage, preimage_one, preimage_const]
split_ifs <;> simp [← compl_eq_univ_diff]
| Mathlib/Algebra/Group/Indicator.lean | 247 | 250 |
/-
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.Algebra.Polynomial.Module.AEval
/-!
# Polynomial module
In this file, we define the polynomial module for an `R`-module `M`, i.e. the `R[X]`-module `M[X]`.
This is defined as a type alias `PolynomialModule R M := ℕ →₀ M`, since there might be different
module structures on `ℕ →₀ M` of interest. See the docstring of `PolynomialModule` for details.
-/
universe u v
open Polynomial
/-- The `R[X]`-module `M[X]` for an `R`-module `M`.
This is isomorphic (as an `R`-module) to `M[X]` when `M` is a ring.
We require all the module instances `Module S (PolynomialModule R M)` to factor through `R` except
`Module R[X] (PolynomialModule R M)`.
In this constraint, we have the following instances for example :
- `R` acts on `PolynomialModule R R[X]`
- `R[X]` acts on `PolynomialModule R R[X]` as `R[Y]` acting on `R[X][Y]`
- `R` acts on `PolynomialModule R[X] R[X]`
- `R[X]` acts on `PolynomialModule R[X] R[X]` as `R[X]` acting on `R[X][Y]`
- `R[X][X]` acts on `PolynomialModule R[X] R[X]` as `R[X][Y]` acting on itself
This is also the reason why `R` is included in the alias, or else there will be two different
instances of `Module R[X] (PolynomialModule R[X])`.
See https://leanprover.zulipchat.com/#narrow/stream/144837-PR-reviews/topic/.2315065.20polynomial.20modules
for the full discussion.
-/
@[nolint unusedArguments]
def PolynomialModule (R M : Type*) [CommRing R] [AddCommGroup M] [Module R M] := ℕ →₀ M
variable (R M : Type*) [CommRing R] [AddCommGroup M] [Module R M] (I : Ideal R)
-- The `Inhabited, AddCommGroup` instances should be constructed by a deriving handler.
-- https://github.com/leanprover-community/mathlib4/issues/380
noncomputable instance : Inhabited (PolynomialModule R M) := Finsupp.instInhabited
noncomputable instance : AddCommGroup (PolynomialModule R M) := Finsupp.instAddCommGroup
variable {M}
variable {S : Type*} [CommSemiring S] [Algebra S R] [Module S M] [IsScalarTower S R M]
namespace PolynomialModule
/-- This is required to have the `IsScalarTower S R M` instance to avoid diamonds. -/
@[nolint unusedArguments]
noncomputable instance : Module S (PolynomialModule R M) :=
Finsupp.module ℕ M
instance instFunLike : FunLike (PolynomialModule R M) ℕ M :=
Finsupp.instFunLike
instance : CoeFun (PolynomialModule R M) fun _ => ℕ → M :=
inferInstanceAs <| CoeFun (_ →₀ _) _
theorem zero_apply (i : ℕ) : (0 : PolynomialModule R M) i = 0 :=
Finsupp.zero_apply
theorem add_apply (g₁ g₂ : PolynomialModule R M) (a : ℕ) : (g₁ + g₂) a = g₁ a + g₂ a :=
Finsupp.add_apply g₁ g₂ a
/-- The monomial `m * x ^ i`. This is defeq to `Finsupp.singleAddHom`, and is redefined here
so that it has the desired type signature. -/
noncomputable def single (i : ℕ) : M →+ PolynomialModule R M :=
Finsupp.singleAddHom i
theorem single_apply (i : ℕ) (m : M) (n : ℕ) : single R i m n = ite (i = n) m 0 :=
Finsupp.single_apply
/-- `PolynomialModule.single` as a linear map. -/
noncomputable def lsingle (i : ℕ) : M →ₗ[R] PolynomialModule R M :=
Finsupp.lsingle i
theorem lsingle_apply (i : ℕ) (m : M) (n : ℕ) : lsingle R i m n = ite (i = n) m 0 :=
Finsupp.single_apply
theorem single_smul (i : ℕ) (r : R) (m : M) : single R i (r • m) = r • single R i m :=
(lsingle R i).map_smul r m
variable {R}
@[elab_as_elim]
theorem induction_linear {motive : PolynomialModule R M → Prop} (f : PolynomialModule R M)
(zero : motive 0) (add : ∀ f g, motive f → motive g → motive (f + g))
(single : ∀ a b, motive (single R a b)) : motive f :=
Finsupp.induction_linear f zero add single
noncomputable instance polynomialModule : Module R[X] (PolynomialModule R M) :=
inferInstanceAs (Module R[X] (Module.AEval' (Finsupp.lmapDomain M R Nat.succ)))
lemma smul_def (f : R[X]) (m : PolynomialModule R M) :
f • m = aeval (Finsupp.lmapDomain M R Nat.succ) f m := by
rfl
instance (M : Type u) [AddCommGroup M] [Module R M] [Module S M] [IsScalarTower S R M] :
IsScalarTower S R (PolynomialModule R M) :=
Finsupp.isScalarTower _ _
|
instance isScalarTower' (M : Type u) [AddCommGroup M] [Module R M] [Module S M]
[IsScalarTower S R M] : IsScalarTower S R[X] (PolynomialModule R M) := by
| Mathlib/Algebra/Polynomial/Module/Basic.lean | 105 | 107 |
/-
Copyright (c) 2019 Jeremy Avigad. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Jeremy Avigad, Sébastien Gouëzel, Yury Kudryashov
-/
import Mathlib.Analysis.Calculus.FDeriv.Linear
import Mathlib.Analysis.Calculus.FDeriv.Comp
/-!
# Additive operations on derivatives
For detailed documentation of the Fréchet derivative,
see the module docstring of `Analysis/Calculus/FDeriv/Basic.lean`.
This file contains the usual formulas (and existence assertions) for the derivative of
* sum of finitely many functions
* multiplication of a function by a scalar constant
* negative of a function
* subtraction of two functions
-/
open Filter Asymptotics ContinuousLinearMap
noncomputable section
section
variable {𝕜 : Type*} [NontriviallyNormedField 𝕜]
variable {E : Type*} [NormedAddCommGroup E] [NormedSpace 𝕜 E]
variable {F : Type*} [NormedAddCommGroup F] [NormedSpace 𝕜 F]
variable {f g : E → F}
variable {f' g' : E →L[𝕜] F}
variable {x : E}
variable {s : Set E}
variable {L : Filter E}
section ConstSMul
variable {R : Type*} [Semiring R] [Module R F] [SMulCommClass 𝕜 R F] [ContinuousConstSMul R F]
/-! ### Derivative of a function multiplied by a constant -/
@[fun_prop]
theorem HasStrictFDerivAt.const_smul (h : HasStrictFDerivAt f f' x) (c : R) :
HasStrictFDerivAt (fun x => c • f x) (c • f') x :=
(c • (1 : F →L[𝕜] F)).hasStrictFDerivAt.comp x h
theorem HasFDerivAtFilter.const_smul (h : HasFDerivAtFilter f f' x L) (c : R) :
HasFDerivAtFilter (fun x => c • f x) (c • f') x L :=
(c • (1 : F →L[𝕜] F)).hasFDerivAtFilter.comp x h tendsto_map
@[fun_prop]
nonrec theorem HasFDerivWithinAt.const_smul (h : HasFDerivWithinAt f f' s x) (c : R) :
HasFDerivWithinAt (fun x => c • f x) (c • f') s x :=
h.const_smul c
@[fun_prop]
nonrec theorem HasFDerivAt.const_smul (h : HasFDerivAt f f' x) (c : R) :
HasFDerivAt (fun x => c • f x) (c • f') x :=
h.const_smul c
@[fun_prop]
theorem DifferentiableWithinAt.const_smul (h : DifferentiableWithinAt 𝕜 f s x) (c : R) :
DifferentiableWithinAt 𝕜 (fun y => c • f y) s x :=
(h.hasFDerivWithinAt.const_smul c).differentiableWithinAt
@[fun_prop]
theorem DifferentiableAt.const_smul (h : DifferentiableAt 𝕜 f x) (c : R) :
DifferentiableAt 𝕜 (fun y => c • f y) x :=
(h.hasFDerivAt.const_smul c).differentiableAt
@[fun_prop]
theorem DifferentiableOn.const_smul (h : DifferentiableOn 𝕜 f s) (c : R) :
DifferentiableOn 𝕜 (fun y => c • f y) s := fun x hx => (h x hx).const_smul c
@[fun_prop]
theorem Differentiable.const_smul (h : Differentiable 𝕜 f) (c : R) :
Differentiable 𝕜 fun y => c • f y := fun x => (h x).const_smul c
theorem fderivWithin_const_smul (hxs : UniqueDiffWithinAt 𝕜 s x)
(h : DifferentiableWithinAt 𝕜 f s x) (c : R) :
fderivWithin 𝕜 (fun y => c • f y) s x = c • fderivWithin 𝕜 f s x :=
(h.hasFDerivWithinAt.const_smul c).fderivWithin hxs
/-- Version of `fderivWithin_const_smul` written with `c • f` instead of `fun y ↦ c • f y`. -/
theorem fderivWithin_const_smul' (hxs : UniqueDiffWithinAt 𝕜 s x)
(h : DifferentiableWithinAt 𝕜 f s x) (c : R) :
fderivWithin 𝕜 (c • f) s x = c • fderivWithin 𝕜 f s x :=
fderivWithin_const_smul hxs h c
theorem fderiv_const_smul (h : DifferentiableAt 𝕜 f x) (c : R) :
fderiv 𝕜 (fun y => c • f y) x = c • fderiv 𝕜 f x :=
(h.hasFDerivAt.const_smul c).fderiv
/-- Version of `fderiv_const_smul` written with `c • f` instead of `fun y ↦ c • f y`. -/
theorem fderiv_const_smul' (h : DifferentiableAt 𝕜 f x) (c : R) :
fderiv 𝕜 (c • f) x = c • fderiv 𝕜 f x :=
(h.hasFDerivAt.const_smul c).fderiv
end ConstSMul
section Add
/-! ### Derivative of the sum of two functions -/
@[fun_prop]
nonrec theorem HasStrictFDerivAt.add (hf : HasStrictFDerivAt f f' x)
(hg : HasStrictFDerivAt g g' x) : HasStrictFDerivAt (fun y => f y + g y) (f' + g') x :=
.of_isLittleO <| (hf.isLittleO.add hg.isLittleO).congr_left fun y => by
simp only [LinearMap.sub_apply, LinearMap.add_apply, map_sub, map_add, add_apply]
abel
theorem HasFDerivAtFilter.add (hf : HasFDerivAtFilter f f' x L)
(hg : HasFDerivAtFilter g g' x L) : HasFDerivAtFilter (fun y => f y + g y) (f' + g') x L :=
.of_isLittleO <| (hf.isLittleO.add hg.isLittleO).congr_left fun _ => by
simp only [LinearMap.sub_apply, LinearMap.add_apply, map_sub, map_add, add_apply]
abel
@[fun_prop]
nonrec theorem HasFDerivWithinAt.add (hf : HasFDerivWithinAt f f' s x)
(hg : HasFDerivWithinAt g g' s x) : HasFDerivWithinAt (fun y => f y + g y) (f' + g') s x :=
hf.add hg
@[fun_prop]
nonrec theorem HasFDerivAt.add (hf : HasFDerivAt f f' x) (hg : HasFDerivAt g g' x) :
HasFDerivAt (fun x => f x + g x) (f' + g') x :=
hf.add hg
@[fun_prop]
theorem DifferentiableWithinAt.add (hf : DifferentiableWithinAt 𝕜 f s x)
(hg : DifferentiableWithinAt 𝕜 g s x) : DifferentiableWithinAt 𝕜 (fun y => f y + g y) s x :=
(hf.hasFDerivWithinAt.add hg.hasFDerivWithinAt).differentiableWithinAt
@[simp, fun_prop]
theorem DifferentiableAt.add (hf : DifferentiableAt 𝕜 f x) (hg : DifferentiableAt 𝕜 g x) :
DifferentiableAt 𝕜 (fun y => f y + g y) x :=
(hf.hasFDerivAt.add hg.hasFDerivAt).differentiableAt
@[fun_prop]
theorem DifferentiableOn.add (hf : DifferentiableOn 𝕜 f s) (hg : DifferentiableOn 𝕜 g s) :
DifferentiableOn 𝕜 (fun y => f y + g y) s := fun x hx => (hf x hx).add (hg x hx)
@[simp, fun_prop]
theorem Differentiable.add (hf : Differentiable 𝕜 f) (hg : Differentiable 𝕜 g) :
Differentiable 𝕜 fun y => f y + g y := fun x => (hf x).add (hg x)
theorem fderivWithin_add (hxs : UniqueDiffWithinAt 𝕜 s x) (hf : DifferentiableWithinAt 𝕜 f s x)
(hg : DifferentiableWithinAt 𝕜 g s x) :
fderivWithin 𝕜 (fun y => f y + g y) s x = fderivWithin 𝕜 f s x + fderivWithin 𝕜 g s x :=
(hf.hasFDerivWithinAt.add hg.hasFDerivWithinAt).fderivWithin hxs
/-- Version of `fderivWithin_add` where the function is written as `f + g` instead
of `fun y ↦ f y + g y`. -/
theorem fderivWithin_add' (hxs : UniqueDiffWithinAt 𝕜 s x) (hf : DifferentiableWithinAt 𝕜 f s x)
(hg : DifferentiableWithinAt 𝕜 g s x) :
fderivWithin 𝕜 (f + g) s x = fderivWithin 𝕜 f s x + fderivWithin 𝕜 g s x :=
fderivWithin_add hxs hf hg
theorem fderiv_add (hf : DifferentiableAt 𝕜 f x) (hg : DifferentiableAt 𝕜 g x) :
fderiv 𝕜 (fun y => f y + g y) x = fderiv 𝕜 f x + fderiv 𝕜 g x :=
(hf.hasFDerivAt.add hg.hasFDerivAt).fderiv
/-- Version of `fderiv_add` where the function is written as `f + g` instead
of `fun y ↦ f y + g y`. -/
theorem fderiv_add' (hf : DifferentiableAt 𝕜 f x) (hg : DifferentiableAt 𝕜 g x) :
fderiv 𝕜 (f + g) x = fderiv 𝕜 f x + fderiv 𝕜 g x :=
fderiv_add hf hg
@[simp]
theorem hasFDerivAtFilter_add_const_iff (c : F) :
HasFDerivAtFilter (f · + c) f' x L ↔ HasFDerivAtFilter f f' x L := by
simp [hasFDerivAtFilter_iff_isLittleOTVS]
alias ⟨_, HasFDerivAtFilter.add_const⟩ := hasFDerivAtFilter_add_const_iff
@[simp]
theorem hasStrictFDerivAt_add_const_iff (c : F) :
HasStrictFDerivAt (f · + c) f' x ↔ HasStrictFDerivAt f f' x := by
simp [hasStrictFDerivAt_iff_isLittleO]
@[fun_prop]
alias ⟨_, HasStrictFDerivAt.add_const⟩ := hasStrictFDerivAt_add_const_iff
@[simp]
theorem hasFDerivWithinAt_add_const_iff (c : F) :
HasFDerivWithinAt (f · + c) f' s x ↔ HasFDerivWithinAt f f' s x :=
hasFDerivAtFilter_add_const_iff c
@[fun_prop]
alias ⟨_, HasFDerivWithinAt.add_const⟩ := hasFDerivWithinAt_add_const_iff
@[simp]
theorem hasFDerivAt_add_const_iff (c : F) : HasFDerivAt (f · + c) f' x ↔ HasFDerivAt f f' x :=
hasFDerivAtFilter_add_const_iff c
@[fun_prop]
alias ⟨_, HasFDerivAt.add_const⟩ := hasFDerivAt_add_const_iff
@[simp]
theorem differentiableWithinAt_add_const_iff (c : F) :
DifferentiableWithinAt 𝕜 (fun y => f y + c) s x ↔ DifferentiableWithinAt 𝕜 f s x :=
exists_congr fun _ ↦ hasFDerivWithinAt_add_const_iff c
@[fun_prop]
alias ⟨_, DifferentiableWithinAt.add_const⟩ := differentiableWithinAt_add_const_iff
@[simp]
theorem differentiableAt_add_const_iff (c : F) :
DifferentiableAt 𝕜 (fun y => f y + c) x ↔ DifferentiableAt 𝕜 f x :=
exists_congr fun _ ↦ hasFDerivAt_add_const_iff c
@[fun_prop]
alias ⟨_, DifferentiableAt.add_const⟩ := differentiableAt_add_const_iff
@[simp]
theorem differentiableOn_add_const_iff (c : F) :
DifferentiableOn 𝕜 (fun y => f y + c) s ↔ DifferentiableOn 𝕜 f s :=
forall₂_congr fun _ _ ↦ differentiableWithinAt_add_const_iff c
@[fun_prop]
alias ⟨_, DifferentiableOn.add_const⟩ := differentiableOn_add_const_iff
@[simp]
theorem differentiable_add_const_iff (c : F) :
(Differentiable 𝕜 fun y => f y + c) ↔ Differentiable 𝕜 f :=
forall_congr' fun _ ↦ differentiableAt_add_const_iff c
@[fun_prop]
alias ⟨_, Differentiable.add_const⟩ := differentiable_add_const_iff
@[simp]
theorem fderivWithin_add_const (c : F) :
fderivWithin 𝕜 (fun y => f y + c) s x = fderivWithin 𝕜 f s x := by
classical simp [fderivWithin]
@[simp]
theorem fderiv_add_const (c : F) : fderiv 𝕜 (fun y => f y + c) x = fderiv 𝕜 f x := by
simp only [← fderivWithin_univ, fderivWithin_add_const]
@[simp]
theorem hasFDerivAtFilter_const_add_iff (c : F) :
HasFDerivAtFilter (c + f ·) f' x L ↔ HasFDerivAtFilter f f' x L := by
simpa only [add_comm] using hasFDerivAtFilter_add_const_iff c
alias ⟨_, HasFDerivAtFilter.const_add⟩ := hasFDerivAtFilter_const_add_iff
@[simp]
theorem hasStrictFDerivAt_const_add_iff (c : F) :
HasStrictFDerivAt (c + f ·) f' x ↔ HasStrictFDerivAt f f' x := by
simpa only [add_comm] using hasStrictFDerivAt_add_const_iff c
@[fun_prop]
alias ⟨_, HasStrictFDerivAt.const_add⟩ := hasStrictFDerivAt_const_add_iff
@[simp]
theorem hasFDerivWithinAt_const_add_iff (c : F) :
HasFDerivWithinAt (c + f ·) f' s x ↔ HasFDerivWithinAt f f' s x :=
hasFDerivAtFilter_const_add_iff c
@[fun_prop]
alias ⟨_, HasFDerivWithinAt.const_add⟩ := hasFDerivWithinAt_const_add_iff
@[simp]
theorem hasFDerivAt_const_add_iff (c : F) : HasFDerivAt (c + f ·) f' x ↔ HasFDerivAt f f' x :=
hasFDerivAtFilter_const_add_iff c
@[fun_prop]
alias ⟨_, HasFDerivAt.const_add⟩ := hasFDerivAt_const_add_iff
@[simp]
theorem differentiableWithinAt_const_add_iff (c : F) :
DifferentiableWithinAt 𝕜 (fun y => c + f y) s x ↔ DifferentiableWithinAt 𝕜 f s x :=
exists_congr fun _ ↦ hasFDerivWithinAt_const_add_iff c
@[fun_prop]
alias ⟨_, DifferentiableWithinAt.const_add⟩ := differentiableWithinAt_const_add_iff
@[simp]
theorem differentiableAt_const_add_iff (c : F) :
DifferentiableAt 𝕜 (fun y => c + f y) x ↔ DifferentiableAt 𝕜 f x :=
exists_congr fun _ ↦ hasFDerivAt_const_add_iff c
@[fun_prop]
alias ⟨_, DifferentiableAt.const_add⟩ := differentiableAt_const_add_iff
@[simp]
theorem differentiableOn_const_add_iff (c : F) :
DifferentiableOn 𝕜 (fun y => c + f y) s ↔ DifferentiableOn 𝕜 f s :=
forall₂_congr fun _ _ ↦ differentiableWithinAt_const_add_iff c
@[fun_prop]
alias ⟨_, DifferentiableOn.const_add⟩ := differentiableOn_const_add_iff
@[simp]
theorem differentiable_const_add_iff (c : F) :
(Differentiable 𝕜 fun y => c + f y) ↔ Differentiable 𝕜 f :=
forall_congr' fun _ ↦ differentiableAt_const_add_iff c
@[fun_prop]
alias ⟨_, Differentiable.const_add⟩ := differentiable_const_add_iff
@[simp]
theorem fderivWithin_const_add (c : F) :
fderivWithin 𝕜 (fun y => c + f y) s x = fderivWithin 𝕜 f s x := by
simpa only [add_comm] using fderivWithin_add_const c
@[simp]
theorem fderiv_const_add (c : F) : fderiv 𝕜 (fun y => c + f y) x = fderiv 𝕜 f x := by
simp only [add_comm c, fderiv_add_const]
end Add
section Sum
/-! ### Derivative of a finite sum of functions -/
variable {ι : Type*} {u : Finset ι} {A : ι → E → F} {A' : ι → E →L[𝕜] F}
@[fun_prop]
theorem HasStrictFDerivAt.sum (h : ∀ i ∈ u, HasStrictFDerivAt (A i) (A' i) x) :
HasStrictFDerivAt (fun y => ∑ i ∈ u, A i y) (∑ i ∈ u, A' i) x := by
simp only [hasStrictFDerivAt_iff_isLittleO] at *
convert IsLittleO.sum h
simp [Finset.sum_sub_distrib, ContinuousLinearMap.sum_apply]
theorem HasFDerivAtFilter.sum (h : ∀ i ∈ u, HasFDerivAtFilter (A i) (A' i) x L) :
HasFDerivAtFilter (fun y => ∑ i ∈ u, A i y) (∑ i ∈ u, A' i) x L := by
simp only [hasFDerivAtFilter_iff_isLittleO] at *
convert IsLittleO.sum h
simp [ContinuousLinearMap.sum_apply]
@[fun_prop]
theorem HasFDerivWithinAt.sum (h : ∀ i ∈ u, HasFDerivWithinAt (A i) (A' i) s x) :
HasFDerivWithinAt (fun y => ∑ i ∈ u, A i y) (∑ i ∈ u, A' i) s x :=
HasFDerivAtFilter.sum h
@[fun_prop]
theorem HasFDerivAt.sum (h : ∀ i ∈ u, HasFDerivAt (A i) (A' i) x) :
HasFDerivAt (fun y => ∑ i ∈ u, A i y) (∑ i ∈ u, A' i) x :=
HasFDerivAtFilter.sum h
@[fun_prop]
theorem DifferentiableWithinAt.sum (h : ∀ i ∈ u, DifferentiableWithinAt 𝕜 (A i) s x) :
DifferentiableWithinAt 𝕜 (fun y => ∑ i ∈ u, A i y) s x :=
HasFDerivWithinAt.differentiableWithinAt <|
HasFDerivWithinAt.sum fun i hi => (h i hi).hasFDerivWithinAt
@[simp, fun_prop]
theorem DifferentiableAt.sum (h : ∀ i ∈ u, DifferentiableAt 𝕜 (A i) x) :
DifferentiableAt 𝕜 (fun y => ∑ i ∈ u, A i y) x :=
HasFDerivAt.differentiableAt <| HasFDerivAt.sum fun i hi => (h i hi).hasFDerivAt
@[fun_prop]
theorem DifferentiableOn.sum (h : ∀ i ∈ u, DifferentiableOn 𝕜 (A i) s) :
DifferentiableOn 𝕜 (fun y => ∑ i ∈ u, A i y) s := fun x hx =>
DifferentiableWithinAt.sum fun i hi => h i hi x hx
@[simp, fun_prop]
theorem Differentiable.sum (h : ∀ i ∈ u, Differentiable 𝕜 (A i)) :
Differentiable 𝕜 fun y => ∑ i ∈ u, A i y := fun x => DifferentiableAt.sum fun i hi => h i hi x
theorem fderivWithin_sum (hxs : UniqueDiffWithinAt 𝕜 s x)
(h : ∀ i ∈ u, DifferentiableWithinAt 𝕜 (A i) s x) :
fderivWithin 𝕜 (fun y => ∑ i ∈ u, A i y) s x = ∑ i ∈ u, fderivWithin 𝕜 (A i) s x :=
(HasFDerivWithinAt.sum fun i hi => (h i hi).hasFDerivWithinAt).fderivWithin hxs
theorem fderiv_sum (h : ∀ i ∈ u, DifferentiableAt 𝕜 (A i) x) :
fderiv 𝕜 (fun y => ∑ i ∈ u, A i y) x = ∑ i ∈ u, fderiv 𝕜 (A i) x :=
(HasFDerivAt.sum fun i hi => (h i hi).hasFDerivAt).fderiv
end Sum
section Neg
/-! ### Derivative of the negative of a function -/
@[fun_prop]
theorem HasStrictFDerivAt.neg (h : HasStrictFDerivAt f f' x) :
HasStrictFDerivAt (fun x => -f x) (-f') x :=
(-1 : F →L[𝕜] F).hasStrictFDerivAt.comp x h
theorem HasFDerivAtFilter.neg (h : HasFDerivAtFilter f f' x L) :
HasFDerivAtFilter (fun x => -f x) (-f') x L :=
(-1 : F →L[𝕜] F).hasFDerivAtFilter.comp x h tendsto_map
@[fun_prop]
nonrec theorem HasFDerivWithinAt.neg (h : HasFDerivWithinAt f f' s x) :
HasFDerivWithinAt (fun x => -f x) (-f') s x :=
h.neg
@[fun_prop]
nonrec theorem HasFDerivAt.neg (h : HasFDerivAt f f' x) : HasFDerivAt (fun x => -f x) (-f') x :=
h.neg
@[fun_prop]
theorem DifferentiableWithinAt.neg (h : DifferentiableWithinAt 𝕜 f s x) :
DifferentiableWithinAt 𝕜 (fun y => -f y) s x :=
h.hasFDerivWithinAt.neg.differentiableWithinAt
@[simp]
theorem differentiableWithinAt_neg_iff :
DifferentiableWithinAt 𝕜 (fun y => -f y) s x ↔ DifferentiableWithinAt 𝕜 f s x :=
⟨fun h => by simpa only [neg_neg] using h.neg, fun h => h.neg⟩
@[fun_prop]
theorem DifferentiableAt.neg (h : DifferentiableAt 𝕜 f x) : DifferentiableAt 𝕜 (fun y => -f y) x :=
h.hasFDerivAt.neg.differentiableAt
@[simp]
theorem differentiableAt_neg_iff : DifferentiableAt 𝕜 (fun y => -f y) x ↔ DifferentiableAt 𝕜 f x :=
⟨fun h => by simpa only [neg_neg] using h.neg, fun h => h.neg⟩
@[fun_prop]
theorem DifferentiableOn.neg (h : DifferentiableOn 𝕜 f s) : DifferentiableOn 𝕜 (fun y => -f y) s :=
fun x hx => (h x hx).neg
@[simp]
theorem differentiableOn_neg_iff : DifferentiableOn 𝕜 (fun y => -f y) s ↔ DifferentiableOn 𝕜 f s :=
⟨fun h => by simpa only [neg_neg] using h.neg, fun h => h.neg⟩
@[fun_prop]
theorem Differentiable.neg (h : Differentiable 𝕜 f) : Differentiable 𝕜 fun y => -f y := fun x =>
(h x).neg
@[simp]
theorem differentiable_neg_iff : (Differentiable 𝕜 fun y => -f y) ↔ Differentiable 𝕜 f :=
⟨fun h => by simpa only [neg_neg] using h.neg, fun h => h.neg⟩
theorem fderivWithin_neg (hxs : UniqueDiffWithinAt 𝕜 s x) :
fderivWithin 𝕜 (fun y => -f y) s x = -fderivWithin 𝕜 f s x := by
classical
by_cases h : DifferentiableWithinAt 𝕜 f s x
· exact h.hasFDerivWithinAt.neg.fderivWithin hxs
· rw [fderivWithin_zero_of_not_differentiableWithinAt h,
fderivWithin_zero_of_not_differentiableWithinAt, neg_zero]
simpa
/-- Version of `fderivWithin_neg` where the function is written `-f` instead of `fun y ↦ - f y`. -/
theorem fderivWithin_neg' (hxs : UniqueDiffWithinAt 𝕜 s x) :
fderivWithin 𝕜 (-f) s x = -fderivWithin 𝕜 f s x :=
fderivWithin_neg hxs
@[simp]
theorem fderiv_neg : fderiv 𝕜 (fun y => -f y) x = -fderiv 𝕜 f x := by
simp only [← fderivWithin_univ, fderivWithin_neg uniqueDiffWithinAt_univ]
/-- Version of `fderiv_neg` where the function is written `-f` instead of `fun y ↦ - f y`. -/
theorem fderiv_neg' : fderiv 𝕜 (-f) x = -fderiv 𝕜 f x :=
fderiv_neg
end Neg
section Sub
/-! ### Derivative of the difference of two functions -/
@[fun_prop]
theorem HasStrictFDerivAt.sub (hf : HasStrictFDerivAt f f' x) (hg : HasStrictFDerivAt g g' x) :
HasStrictFDerivAt (fun x => f x - g x) (f' - g') x := by
simpa only [sub_eq_add_neg] using hf.add hg.neg
theorem HasFDerivAtFilter.sub (hf : HasFDerivAtFilter f f' x L) (hg : HasFDerivAtFilter g g' x L) :
HasFDerivAtFilter (fun x => f x - g x) (f' - g') x L := by
simpa only [sub_eq_add_neg] using hf.add hg.neg
@[fun_prop]
nonrec theorem HasFDerivWithinAt.sub (hf : HasFDerivWithinAt f f' s x)
(hg : HasFDerivWithinAt g g' s x) : HasFDerivWithinAt (fun x => f x - g x) (f' - g') s x :=
hf.sub hg
@[fun_prop]
nonrec theorem HasFDerivAt.sub (hf : HasFDerivAt f f' x) (hg : HasFDerivAt g g' x) :
HasFDerivAt (fun x => f x - g x) (f' - g') x :=
hf.sub hg
@[fun_prop]
theorem DifferentiableWithinAt.sub (hf : DifferentiableWithinAt 𝕜 f s x)
(hg : DifferentiableWithinAt 𝕜 g s x) : DifferentiableWithinAt 𝕜 (fun y => f y - g y) s x :=
(hf.hasFDerivWithinAt.sub hg.hasFDerivWithinAt).differentiableWithinAt
@[simp, fun_prop]
theorem DifferentiableAt.sub (hf : DifferentiableAt 𝕜 f x) (hg : DifferentiableAt 𝕜 g x) :
DifferentiableAt 𝕜 (fun y => f y - g y) x :=
(hf.hasFDerivAt.sub hg.hasFDerivAt).differentiableAt
@[simp]
lemma DifferentiableAt.add_iff_left (hg : DifferentiableAt 𝕜 g x) :
DifferentiableAt 𝕜 (fun y => f y + g y) x ↔ DifferentiableAt 𝕜 f x := by
refine ⟨fun h ↦ ?_, fun hf ↦ hf.add hg⟩
simpa only [add_sub_cancel_right] using h.sub hg
@[simp]
lemma DifferentiableAt.add_iff_right (hg : DifferentiableAt 𝕜 f x) :
DifferentiableAt 𝕜 (fun y => f y + g y) x ↔ DifferentiableAt 𝕜 g x := by
simp only [add_comm (f _), hg.add_iff_left]
@[simp]
lemma DifferentiableAt.sub_iff_left (hg : DifferentiableAt 𝕜 g x) :
DifferentiableAt 𝕜 (fun y => f y - g y) x ↔ DifferentiableAt 𝕜 f x := by
simp only [sub_eq_add_neg, differentiableAt_neg_iff, hg, add_iff_left]
@[simp]
lemma DifferentiableAt.sub_iff_right (hg : DifferentiableAt 𝕜 f x) :
DifferentiableAt 𝕜 (fun y => f y - g y) x ↔ DifferentiableAt 𝕜 g x := by
simp only [sub_eq_add_neg, hg, add_iff_right, differentiableAt_neg_iff]
@[fun_prop]
theorem DifferentiableOn.sub (hf : DifferentiableOn 𝕜 f s) (hg : DifferentiableOn 𝕜 g s) :
DifferentiableOn 𝕜 (fun y => f y - g y) s := fun x hx => (hf x hx).sub (hg x hx)
@[simp]
lemma DifferentiableOn.add_iff_left (hg : DifferentiableOn 𝕜 g s) :
DifferentiableOn 𝕜 (fun y => f y + g y) s ↔ DifferentiableOn 𝕜 f s := by
refine ⟨fun h ↦ ?_, fun hf ↦ hf.add hg⟩
simpa only [add_sub_cancel_right] using h.sub hg
@[simp]
lemma DifferentiableOn.add_iff_right (hg : DifferentiableOn 𝕜 f s) :
DifferentiableOn 𝕜 (fun y => f y + g y) s ↔ DifferentiableOn 𝕜 g s := by
simp only [add_comm (f _), hg.add_iff_left]
@[simp]
lemma DifferentiableOn.sub_iff_left (hg : DifferentiableOn 𝕜 g s) :
DifferentiableOn 𝕜 (fun y => f y - g y) s ↔ DifferentiableOn 𝕜 f s := by
simp only [sub_eq_add_neg, differentiableOn_neg_iff, hg, add_iff_left]
@[simp]
lemma DifferentiableOn.sub_iff_right (hg : DifferentiableOn 𝕜 f s) :
DifferentiableOn 𝕜 (fun y => f y - g y) s ↔ DifferentiableOn 𝕜 g s := by
simp only [sub_eq_add_neg, differentiableOn_neg_iff, hg, add_iff_right]
@[simp, fun_prop]
theorem Differentiable.sub (hf : Differentiable 𝕜 f) (hg : Differentiable 𝕜 g) :
Differentiable 𝕜 fun y => f y - g y := fun x => (hf x).sub (hg x)
@[simp]
lemma Differentiable.add_iff_left (hg : Differentiable 𝕜 g) :
Differentiable 𝕜 (fun y => f y + g y) ↔ Differentiable 𝕜 f := by
refine ⟨fun h ↦ ?_, fun hf ↦ hf.add hg⟩
simpa only [add_sub_cancel_right] using h.sub hg
@[simp]
lemma Differentiable.add_iff_right (hg : Differentiable 𝕜 f) :
Differentiable 𝕜 (fun y => f y + g y) ↔ Differentiable 𝕜 g := by
simp only [add_comm (f _), hg.add_iff_left]
@[simp]
lemma Differentiable.sub_iff_left (hg : Differentiable 𝕜 g) :
Differentiable 𝕜 (fun y => f y - g y) ↔ Differentiable 𝕜 f := by
simp only [sub_eq_add_neg, differentiable_neg_iff, hg, add_iff_left]
@[simp]
lemma Differentiable.sub_iff_right (hg : Differentiable 𝕜 f) :
Differentiable 𝕜 (fun y => f y - g y) ↔ Differentiable 𝕜 g := by
simp only [sub_eq_add_neg, differentiable_neg_iff, hg, add_iff_right]
theorem fderivWithin_sub (hxs : UniqueDiffWithinAt 𝕜 s x) (hf : DifferentiableWithinAt 𝕜 f s x)
(hg : DifferentiableWithinAt 𝕜 g s x) :
fderivWithin 𝕜 (fun y => f y - g y) s x = fderivWithin 𝕜 f s x - fderivWithin 𝕜 g s x :=
(hf.hasFDerivWithinAt.sub hg.hasFDerivWithinAt).fderivWithin hxs
/-- Version of `fderivWithin_sub` where the function is written as `f - g` instead
of `fun y ↦ f y - g y`. -/
theorem fderivWithin_sub' (hxs : UniqueDiffWithinAt 𝕜 s x) (hf : DifferentiableWithinAt 𝕜 f s x)
(hg : DifferentiableWithinAt 𝕜 g s x) :
fderivWithin 𝕜 (f - g) s x = fderivWithin 𝕜 f s x - fderivWithin 𝕜 g s x :=
fderivWithin_sub hxs hf hg
theorem fderiv_sub (hf : DifferentiableAt 𝕜 f x) (hg : DifferentiableAt 𝕜 g x) :
fderiv 𝕜 (fun y => f y - g y) x = fderiv 𝕜 f x - fderiv 𝕜 g x :=
(hf.hasFDerivAt.sub hg.hasFDerivAt).fderiv
/-- Version of `fderiv_sub` where the function is written as `f - g` instead
of `fun y ↦ f y - g y`. -/
theorem fderiv_sub' (hf : DifferentiableAt 𝕜 f x) (hg : DifferentiableAt 𝕜 g x) :
fderiv 𝕜 (f - g) x = fderiv 𝕜 f x - fderiv 𝕜 g x :=
fderiv_sub hf hg
@[simp]
theorem hasFDerivAtFilter_sub_const_iff (c : F) :
HasFDerivAtFilter (f · - c) f' x L ↔ HasFDerivAtFilter f f' x L := by
simp only [sub_eq_add_neg, hasFDerivAtFilter_add_const_iff]
alias ⟨_, HasFDerivAtFilter.sub_const⟩ := hasFDerivAtFilter_sub_const_iff
@[simp]
theorem hasStrictFDerivAt_sub_const_iff (c : F) :
HasStrictFDerivAt (f · - c) f' x ↔ HasStrictFDerivAt f f' x := by
simp only [sub_eq_add_neg, hasStrictFDerivAt_add_const_iff]
@[fun_prop]
alias ⟨_, HasStrictFDerivAt.sub_const⟩ := hasStrictFDerivAt_sub_const_iff
@[simp]
theorem hasFDerivWithinAt_sub_const_iff (c : F) :
HasFDerivWithinAt (f · - c) f' s x ↔ HasFDerivWithinAt f f' s x :=
hasFDerivAtFilter_sub_const_iff c
@[fun_prop]
alias ⟨_, HasFDerivWithinAt.sub_const⟩ := hasFDerivWithinAt_sub_const_iff
@[simp]
theorem hasFDerivAt_sub_const_iff (c : F) : HasFDerivAt (f · - c) f' x ↔ HasFDerivAt f f' x :=
hasFDerivAtFilter_sub_const_iff c
@[fun_prop]
alias ⟨_, HasFDerivAt.sub_const⟩ := hasFDerivAt_sub_const_iff
@[fun_prop]
theorem hasStrictFDerivAt_sub_const {x : F} (c : F) : HasStrictFDerivAt (· - c) (id 𝕜 F) x :=
(hasStrictFDerivAt_id x).sub_const c
@[fun_prop]
theorem hasFDerivAt_sub_const {x : F} (c : F) : HasFDerivAt (· - c) (id 𝕜 F) x :=
(hasFDerivAt_id x).sub_const c
@[fun_prop]
theorem DifferentiableWithinAt.sub_const (hf : DifferentiableWithinAt 𝕜 f s x) (c : F) :
DifferentiableWithinAt 𝕜 (fun y => f y - c) s x :=
(hf.hasFDerivWithinAt.sub_const c).differentiableWithinAt
@[simp]
theorem differentiableWithinAt_sub_const_iff (c : F) :
DifferentiableWithinAt 𝕜 (fun y => f y - c) s x ↔ DifferentiableWithinAt 𝕜 f s x := by
simp only [sub_eq_add_neg, differentiableWithinAt_add_const_iff]
@[fun_prop]
theorem DifferentiableAt.sub_const (hf : DifferentiableAt 𝕜 f x) (c : F) :
DifferentiableAt 𝕜 (fun y => f y - c) x :=
(hf.hasFDerivAt.sub_const c).differentiableAt
@[fun_prop]
theorem DifferentiableOn.sub_const (hf : DifferentiableOn 𝕜 f s) (c : F) :
DifferentiableOn 𝕜 (fun y => f y - c) s := fun x hx => (hf x hx).sub_const c
@[fun_prop]
theorem Differentiable.sub_const (hf : Differentiable 𝕜 f) (c : F) :
Differentiable 𝕜 fun y => f y - c := fun x => (hf x).sub_const c
theorem fderivWithin_sub_const (c : F) :
fderivWithin 𝕜 (fun y => f y - c) s x = fderivWithin 𝕜 f s x := by
simp only [sub_eq_add_neg, fderivWithin_add_const]
theorem fderiv_sub_const (c : F) : fderiv 𝕜 (fun y => f y - c) x = fderiv 𝕜 f x := by
simp only [sub_eq_add_neg, fderiv_add_const]
theorem HasFDerivAtFilter.const_sub (hf : HasFDerivAtFilter f f' x L) (c : F) :
HasFDerivAtFilter (fun x => c - f x) (-f') x L := by
simpa only [sub_eq_add_neg] using hf.neg.const_add c
@[fun_prop]
nonrec theorem HasStrictFDerivAt.const_sub (hf : HasStrictFDerivAt f f' x) (c : F) :
HasStrictFDerivAt (fun x => c - f x) (-f') x := by
simpa only [sub_eq_add_neg] using hf.neg.const_add c
@[fun_prop]
nonrec theorem HasFDerivWithinAt.const_sub (hf : HasFDerivWithinAt f f' s x) (c : F) :
HasFDerivWithinAt (fun x => c - f x) (-f') s x :=
hf.const_sub c
@[fun_prop]
nonrec theorem HasFDerivAt.const_sub (hf : HasFDerivAt f f' x) (c : F) :
HasFDerivAt (fun x => c - f x) (-f') x :=
hf.const_sub c
@[fun_prop]
theorem DifferentiableWithinAt.const_sub (hf : DifferentiableWithinAt 𝕜 f s x) (c : F) :
DifferentiableWithinAt 𝕜 (fun y => c - f y) s x :=
(hf.hasFDerivWithinAt.const_sub c).differentiableWithinAt
@[simp]
theorem differentiableWithinAt_const_sub_iff (c : F) :
DifferentiableWithinAt 𝕜 (fun y => c - f y) s x ↔ DifferentiableWithinAt 𝕜 f s x := by
simp [sub_eq_add_neg]
@[fun_prop]
theorem DifferentiableAt.const_sub (hf : DifferentiableAt 𝕜 f x) (c : F) :
DifferentiableAt 𝕜 (fun y => c - f y) x :=
(hf.hasFDerivAt.const_sub c).differentiableAt
@[fun_prop]
theorem DifferentiableOn.const_sub (hf : DifferentiableOn 𝕜 f s) (c : F) :
DifferentiableOn 𝕜 (fun y => c - f y) s := fun x hx => (hf x hx).const_sub c
@[fun_prop]
theorem Differentiable.const_sub (hf : Differentiable 𝕜 f) (c : F) :
Differentiable 𝕜 fun y => c - f y := fun x => (hf x).const_sub c
theorem fderivWithin_const_sub (hxs : UniqueDiffWithinAt 𝕜 s x) (c : F) :
fderivWithin 𝕜 (fun y => c - f y) s x = -fderivWithin 𝕜 f s x := by
simp only [sub_eq_add_neg, fderivWithin_const_add, fderivWithin_neg, hxs]
theorem fderiv_const_sub (c : F) : fderiv 𝕜 (fun y => c - f y) x = -fderiv 𝕜 f x := by
simp only [← fderivWithin_univ, fderivWithin_const_sub uniqueDiffWithinAt_univ]
end Sub
section CompAdd
/-! ### Derivative of the composition with a translation -/
|
open scoped Pointwise Topology
| Mathlib/Analysis/Calculus/FDeriv/Add.lean | 707 | 709 |
/-
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
| Mathlib/NumberTheory/ArithmeticFunction.lean | 861 | 865 |
/-
Copyright (c) 2023 David Kurniadi Angdinata. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: David Kurniadi Angdinata
-/
import Mathlib.AlgebraicGeometry.EllipticCurve.Affine
import Mathlib.LinearAlgebra.FreeModule.Norm
import Mathlib.RingTheory.ClassGroup
import Mathlib.RingTheory.Polynomial.UniqueFactorization
/-!
# Group law on Weierstrass curves
This file proves that the nonsingular rational points on a Weierstrass curve form an abelian group
under the geometric group law defined in `Mathlib/AlgebraicGeometry/EllipticCurve/Affine.lean`.
## Mathematical background
Let `W` be a Weierstrass curve over a field `F` given by a Weierstrass equation `W(X, Y) = 0` in
affine coordinates. As in `Mathlib/AlgebraicGeometry/EllipticCurve/Affine.lean`, the set of
nonsingular rational points `W⟮F⟯` of `W` consist of the unique point at infinity `𝓞` and
nonsingular affine points `(x, y)`. With this description, there is an addition-preserving injection
between `W⟮F⟯` and the ideal class group of the *affine coordinate ring*
`F[W] := F[X, Y] / ⟨W(X, Y)⟩` of `W`. This is given by mapping `𝓞` to the trivial ideal class and a
nonsingular affine point `(x, y)` to the ideal class of the invertible ideal `⟨X - x, Y - y⟩`.
Proving that this is well-defined and preserves addition reduces to equalities of integral ideals
checked in `WeierstrassCurve.Affine.CoordinateRing.XYIdeal_neg_mul` and in
`WeierstrassCurve.Affine.CoordinateRing.XYIdeal_mul_XYIdeal` via explicit ideal computations.
Now `F[W]` is a free rank two `F[X]`-algebra with basis `{1, Y}`, so every element of `F[W]` is of
the form `p + qY` for some `p, q` in `F[X]`, and there is an algebra norm `N : F[W] → F[X]`.
Injectivity can then be shown by computing the degree of such a norm `N(p + qY)` in two different
ways, which is done in `WeierstrassCurve.Affine.CoordinateRing.degree_norm_smul_basis` and in the
auxiliary lemmas in the proof of `WeierstrassCurve.Affine.Point.instAddCommGroup`.
## Main definitions
* `WeierstrassCurve.Affine.CoordinateRing`: the coordinate ring `F[W]` of a Weierstrass curve `W`.
* `WeierstrassCurve.Affine.CoordinateRing.basis`: the power basis of `F[W]` over `F[X]`.
## Main statements
* `WeierstrassCurve.Affine.CoordinateRing.instIsDomainCoordinateRing`: the affine coordinate ring
of a Weierstrass curve is an integral domain.
* `WeierstrassCurve.Affine.CoordinateRing.degree_norm_smul_basis`: the degree of the norm of an
element in the affine coordinate ring in terms of its power basis.
* `WeierstrassCurve.Affine.Point.instAddCommGroup`: the type of nonsingular points `W⟮F⟯` in affine
coordinates forms an abelian group under addition.
## References
https://drops.dagstuhl.de/storage/00lipics/lipics-vol268-itp2023/LIPIcs.ITP.2023.6/LIPIcs.ITP.2023.6.pdf
## Tags
elliptic curve, group law, class group
-/
open Ideal Polynomial
open scoped nonZeroDivisors Polynomial.Bivariate
local macro "C_simp" : tactic =>
`(tactic| simp only [map_ofNat, C_0, C_1, C_neg, C_add, C_sub, C_mul, C_pow])
local macro "eval_simp" : tactic =>
`(tactic| simp only [eval_C, eval_X, eval_neg, eval_add, eval_sub, eval_mul, eval_pow])
universe u v
namespace WeierstrassCurve.Affine
/-! ## Weierstrass curves in affine coordinates -/
variable {R : Type u} {S : Type v} [CommRing R] [CommRing S] (W : Affine R) (f : R →+* S)
-- Porting note: in Lean 3, this is a `def` under a `derive comm_ring` tag.
-- This generates a reducible instance of `comm_ring` for `coordinate_ring`. In certain
-- circumstances this might be extremely slow, because all instances in its definition are unified
-- exponentially many times. In this case, one solution is to manually add the local attribute
-- `local attribute [irreducible] coordinate_ring.comm_ring` to block this type-level unification.
-- In Lean 4, this is no longer an issue and is now an `abbrev`. See Zulip thread:
-- https://leanprover.zulipchat.com/#narrow/stream/116395-maths/topic/.E2.9C.94.20class_group.2Emk
/-- The affine coordinate ring `R[W] := R[X, Y] / ⟨W(X, Y)⟩` of a Weierstrass curve `W`. -/
abbrev CoordinateRing : Type u :=
AdjoinRoot W.polynomial
/-- The function field `R(W) := Frac(R[W])` of a Weierstrass curve `W`. -/
abbrev FunctionField : Type u :=
FractionRing W.CoordinateRing
namespace CoordinateRing
section Algebra
/-! ### The coordinate ring as an `R[X]`-algebra -/
noncomputable instance : Algebra R W.CoordinateRing :=
Quotient.algebra R
noncomputable instance : Algebra R[X] W.CoordinateRing :=
Quotient.algebra R[X]
instance : IsScalarTower R R[X] W.CoordinateRing :=
Quotient.isScalarTower R R[X] _
instance [Subsingleton R] : Subsingleton W.CoordinateRing :=
Module.subsingleton R[X] _
/-- The natural ring homomorphism mapping `R[X][Y]` to `R[W]`. -/
noncomputable abbrev mk : R[X][Y] →+* W.CoordinateRing :=
AdjoinRoot.mk W.polynomial
/-- The power basis `{1, Y}` for `R[W]` over `R[X]`. -/
protected noncomputable def basis : Basis (Fin 2) R[X] W.CoordinateRing := by
classical exact (subsingleton_or_nontrivial R).by_cases (fun _ => default) fun _ =>
(AdjoinRoot.powerBasis' W.monic_polynomial).basis.reindex <| finCongr W.natDegree_polynomial
lemma basis_apply (n : Fin 2) :
CoordinateRing.basis W n = (AdjoinRoot.powerBasis' W.monic_polynomial).gen ^ (n : ℕ) := by
classical
nontriviality R
rw [CoordinateRing.basis, Or.by_cases, dif_neg <| not_subsingleton R, Basis.reindex_apply,
PowerBasis.basis_eq_pow]
rfl
@[simp]
lemma basis_zero : CoordinateRing.basis W 0 = 1 := by
simpa only [basis_apply] using pow_zero _
@[simp]
lemma basis_one : CoordinateRing.basis W 1 = mk W Y := by
simpa only [basis_apply] using pow_one _
lemma coe_basis : (CoordinateRing.basis W : Fin 2 → W.CoordinateRing) = ![1, mk W Y] := by
ext n
fin_cases n
exacts [basis_zero W, basis_one W]
variable {W} in
lemma smul (x : R[X]) (y : W.CoordinateRing) : x • y = mk W (C x) * y :=
(algebraMap_smul W.CoordinateRing x y).symm
variable {W} in
lemma smul_basis_eq_zero {p q : R[X]} (hpq : p • (1 : W.CoordinateRing) + q • mk W Y = 0) :
p = 0 ∧ q = 0 := by
have h := Fintype.linearIndependent_iff.mp (CoordinateRing.basis W).linearIndependent ![p, q]
rw [Fin.sum_univ_succ, basis_zero, Fin.sum_univ_one, Fin.succ_zero_eq_one, basis_one] at h
exact ⟨h hpq 0, h hpq 1⟩
variable {W} in
lemma exists_smul_basis_eq (x : W.CoordinateRing) :
∃ p q : R[X], p • (1 : W.CoordinateRing) + q • mk W Y = x := by
have h := (CoordinateRing.basis W).sum_equivFun x
rw [Fin.sum_univ_succ, Fin.sum_univ_one, basis_zero, Fin.succ_zero_eq_one, basis_one] at h
exact ⟨_, _, h⟩
lemma smul_basis_mul_C (y : R[X]) (p q : R[X]) :
(p • (1 : W.CoordinateRing) + q • mk W Y) * mk W (C y) =
(p * y) • (1 : W.CoordinateRing) + (q * y) • mk W Y := by
simp only [smul, map_mul]
ring1
lemma smul_basis_mul_Y (p q : R[X]) : (p • (1 : W.CoordinateRing) + q • mk W Y) * mk W Y =
(q * (X ^ 3 + C W.a₂ * X ^ 2 + C W.a₄ * X + C W.a₆)) • (1 : W.CoordinateRing) +
(p - q * (C W.a₁ * X + C W.a₃)) • mk W Y := by
have Y_sq : mk W Y ^ 2 =
mk W (C (X ^ 3 + C W.a₂ * X ^ 2 + C W.a₄ * X + C W.a₆) - C (C W.a₁ * X + C W.a₃) * Y) := by
exact AdjoinRoot.mk_eq_mk.mpr ⟨1, by rw [polynomial]; ring1⟩
simp only [smul, add_mul, mul_assoc, ← sq, Y_sq, C_sub, map_sub, C_mul, map_mul]
ring1
/-- The ring homomorphism `R[W] →+* S[W.map f]` induced by a ring homomorphism `f : R →+* S`. -/
noncomputable def map : W.CoordinateRing →+* (W.map f).toAffine.CoordinateRing :=
AdjoinRoot.lift ((AdjoinRoot.of _).comp <| mapRingHom f)
((AdjoinRoot.root (WeierstrassCurve.map W f).toAffine.polynomial)) <| by
rw [← eval₂_map, ← map_polynomial, AdjoinRoot.eval₂_root]
lemma map_mk (x : R[X][Y]) : map W f (mk W x) = mk (W.map f) (x.map <| mapRingHom f) := by
rw [map, AdjoinRoot.lift_mk, ← eval₂_map]
exact AdjoinRoot.aeval_eq <| x.map <| mapRingHom f
variable {W} in
protected lemma map_smul (x : R[X]) (y : W.CoordinateRing) :
map W f (x • y) = x.map f • map W f y := by
rw [smul, map_mul, map_mk, map_C, smul]
rfl
variable {f} in
lemma map_injective (hf : Function.Injective f) : Function.Injective <| map W f :=
(injective_iff_map_eq_zero _).mpr fun y hy => by
obtain ⟨p, q, rfl⟩ := exists_smul_basis_eq y
simp_rw [map_add, CoordinateRing.map_smul, map_one, map_mk, map_X] at hy
obtain ⟨hp, hq⟩ := smul_basis_eq_zero hy
rw [Polynomial.map_eq_zero_iff hf] at hp hq
simp_rw [hp, hq, zero_smul, add_zero]
instance [IsDomain R] : IsDomain W.CoordinateRing :=
have : IsDomain (W.map <| algebraMap R <| FractionRing R).toAffine.CoordinateRing :=
AdjoinRoot.isDomain_of_prime irreducible_polynomial.prime
(map_injective W <| IsFractionRing.injective R <| FractionRing R).isDomain
end Algebra
section Ring
/-! ### Ideals in the coordinate ring over a ring -/
/-- The class of the element `X - x` in `R[W]` for some `x` in `R`. -/
noncomputable def XClass (x : R) : W.CoordinateRing :=
mk W <| C <| X - C x
lemma XClass_ne_zero [Nontrivial R] (x : R) : XClass W x ≠ 0 :=
AdjoinRoot.mk_ne_zero_of_natDegree_lt W.monic_polynomial (C_ne_zero.mpr <| X_sub_C_ne_zero x) <|
by rw [natDegree_polynomial, natDegree_C]; norm_num1
/-- The class of the element `Y - y(X)` in `R[W]` for some `y(X)` in `R[X]`. -/
noncomputable def YClass (y : R[X]) : W.CoordinateRing :=
mk W <| Y - C y
lemma YClass_ne_zero [Nontrivial R] (y : R[X]) : YClass W y ≠ 0 :=
AdjoinRoot.mk_ne_zero_of_natDegree_lt W.monic_polynomial (X_sub_C_ne_zero y) <|
by rw [natDegree_polynomial, natDegree_X_sub_C]; norm_num1
lemma C_addPolynomial (x y L : R) : mk W (C <| W.addPolynomial x y L) =
mk W ((Y - C (linePolynomial x y L)) * (W.negPolynomial - C (linePolynomial x y L))) :=
AdjoinRoot.mk_eq_mk.mpr ⟨1, by rw [W.C_addPolynomial, add_sub_cancel_left, mul_one]⟩
/-- The ideal `⟨X - x⟩` of `R[W]` for some `x` in `R`. -/
noncomputable def XIdeal (x : R) : Ideal W.CoordinateRing :=
span {XClass W x}
/-- The ideal `⟨Y - y(X)⟩` of `R[W]` for some `y(X)` in `R[X]`. -/
noncomputable def YIdeal (y : R[X]) : Ideal W.CoordinateRing :=
span {YClass W y}
/-- The ideal `⟨X - x, Y - y(X)⟩` of `R[W]` for some `x` in `R` and `y(X)` in `R[X]`. -/
noncomputable def XYIdeal (x : R) (y : R[X]) : Ideal W.CoordinateRing :=
span {XClass W x, YClass W y}
lemma XYIdeal_eq₁ (x y L : R) : XYIdeal W x (C y) = XYIdeal W x (linePolynomial x y L) := by
simp only [XYIdeal, XClass, YClass, linePolynomial]
| rw [← span_pair_add_mul_right <| mk W <| C <| C <| -L, ← map_mul, ← map_add]
apply congr_arg (_ ∘ _ ∘ _ ∘ _)
C_simp
| Mathlib/AlgebraicGeometry/EllipticCurve/Group.lean | 242 | 244 |
/-
Copyright (c) 2021 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes
-/
import Mathlib.Algebra.MvPolynomial.Variables
/-!
# Polynomials supported by a set of variables
This file contains the definition and lemmas about `MvPolynomial.supported`.
## Main definitions
* `MvPolynomial.supported` : Given a set `s : Set σ`, `supported R s` is the subalgebra of
`MvPolynomial σ R` consisting of polynomials whose set of variables is contained in `s`.
This subalgebra is isomorphic to `MvPolynomial s R`.
## Tags
variables, polynomial, vars
-/
universe u v w
namespace MvPolynomial
variable {σ : Type*} {R : Type u}
section CommSemiring
variable [CommSemiring R] {p : MvPolynomial σ R}
variable (R) in
/-- The set of polynomials whose variables are contained in `s` as a `Subalgebra` over `R`. -/
noncomputable def supported (s : Set σ) : Subalgebra R (MvPolynomial σ R) :=
Algebra.adjoin R (X '' s)
open Algebra
theorem supported_eq_range_rename (s : Set σ) : supported R s = (rename ((↑) : s → σ)).range := by
rw [supported, Set.image_eq_range, adjoin_range_eq_range_aeval, rename]
congr
/-- The isomorphism between the subalgebra of polynomials supported by `s` and
`MvPolynomial s R`. -/
noncomputable def supportedEquivMvPolynomial (s : Set σ) : supported R s ≃ₐ[R] MvPolynomial s R :=
(Subalgebra.equivOfEq _ _ (supported_eq_range_rename s)).trans
(AlgEquiv.ofInjective (rename ((↑) : s → σ)) (rename_injective _ Subtype.val_injective)).symm
@[simp]
theorem supportedEquivMvPolynomial_symm_C (s : Set σ) (x : R) :
(supportedEquivMvPolynomial s).symm (C x) = algebraMap R (supported R s) x := by
ext1
simp [supportedEquivMvPolynomial, MvPolynomial.algebraMap_eq]
@[simp]
theorem supportedEquivMvPolynomial_symm_X (s : Set σ) (i : s) :
(↑((supportedEquivMvPolynomial s).symm (X i : MvPolynomial s R)) : MvPolynomial σ R) = X ↑i :=
by simp [supportedEquivMvPolynomial]
variable {s t : Set σ}
theorem mem_supported : p ∈ supported R s ↔ ↑p.vars ⊆ s := by
classical
rw [supported_eq_range_rename, AlgHom.mem_range]
constructor
· rintro ⟨p, rfl⟩
refine _root_.trans (Finset.coe_subset.2 (vars_rename _ _)) ?_
simp
· intro hs
exact exists_rename_eq_of_vars_subset_range p ((↑) : s → σ) Subtype.val_injective (by simpa)
theorem supported_eq_vars_subset : (supported R s : Set (MvPolynomial σ R)) = { p | ↑p.vars ⊆ s } :=
Set.ext fun _ ↦ mem_supported
@[simp]
theorem mem_supported_vars (p : MvPolynomial σ R) : p ∈ supported R (↑p.vars : Set σ) := by
rw [mem_supported]
variable (s)
theorem supported_eq_adjoin_X : supported R s = Algebra.adjoin R (X '' s) := rfl
@[simp]
theorem supported_univ : supported R (Set.univ : Set σ) = ⊤ := by
simp [Algebra.eq_top_iff, mem_supported]
@[simp]
theorem supported_empty : supported R (∅ : Set σ) = ⊥ := by simp [supported_eq_adjoin_X]
variable {s}
theorem supported_mono (st : s ⊆ t) : supported R s ≤ supported R t :=
Algebra.adjoin_mono (Set.image_subset _ st)
@[simp]
theorem X_mem_supported [Nontrivial R] {i : σ} : X i ∈ supported R s ↔ i ∈ s := by
simp [mem_supported]
@[simp]
| theorem supported_le_supported_iff [Nontrivial R] : supported R s ≤ supported R t ↔ s ⊆ t := by
constructor
| Mathlib/Algebra/MvPolynomial/Supported.lean | 102 | 103 |
/-
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.Subalgebra
import Mathlib.LinearAlgebra.Finsupp.Span
/-!
# Lie submodules of a Lie algebra
In this file we define Lie submodules, we construct the lattice structure on Lie submodules and we
use it to define various important operations, notably the Lie span of a subset of a Lie module.
## Main definitions
* `LieSubmodule`
* `LieSubmodule.wellFounded_of_noetherian`
* `LieSubmodule.lieSpan`
* `LieSubmodule.map`
* `LieSubmodule.comap`
## Tags
lie algebra, lie submodule, lie ideal, lattice structure
-/
universe u v w w₁ w₂
section LieSubmodule
variable (R : Type u) (L : Type v) (M : Type w)
variable [CommRing R] [LieRing L] [AddCommGroup M] [Module R M]
variable [LieRingModule L M]
/-- A Lie submodule of a Lie module is a submodule that is closed under the Lie bracket.
This is a sufficient condition for the subset itself to form a Lie module. -/
structure LieSubmodule extends Submodule R M where
lie_mem : ∀ {x : L} {m : M}, m ∈ carrier → ⁅x, m⁆ ∈ carrier
attribute [nolint docBlame] LieSubmodule.toSubmodule
attribute [coe] LieSubmodule.toSubmodule
namespace LieSubmodule
variable {R L M}
variable (N N' : LieSubmodule R L M)
instance : SetLike (LieSubmodule R L M) M where
coe s := s.carrier
coe_injective' N O h := by cases N; cases O; congr; exact SetLike.coe_injective' h
instance : AddSubgroupClass (LieSubmodule R L M) M where
add_mem {N} _ _ := N.add_mem'
zero_mem N := N.zero_mem'
neg_mem {N} x hx := show -x ∈ N.toSubmodule from neg_mem hx
instance instSMulMemClass : SMulMemClass (LieSubmodule R L M) R M where
smul_mem {s} c _ h := s.smul_mem' c h
/-- The zero module is a Lie submodule of any Lie module. -/
instance : Zero (LieSubmodule R L M) :=
⟨{ (0 : Submodule R M) with
lie_mem := fun {x m} h ↦ by rw [(Submodule.mem_bot R).1 h]; apply lie_zero }⟩
instance : Inhabited (LieSubmodule R L M) :=
⟨0⟩
instance (priority := high) coeSort : CoeSort (LieSubmodule R L M) (Type w) where
coe N := { x : M // x ∈ N }
instance (priority := mid) coeSubmodule : CoeOut (LieSubmodule R L M) (Submodule R M) :=
⟨toSubmodule⟩
instance : CanLift (Submodule R M) (LieSubmodule R L M) (·)
(fun N ↦ ∀ {x : L} {m : M}, m ∈ N → ⁅x, m⁆ ∈ N) where
prf N hN := ⟨⟨N, hN⟩, rfl⟩
@[norm_cast]
theorem coe_toSubmodule : ((N : Submodule R M) : Set M) = N :=
rfl
theorem mem_carrier {x : M} : x ∈ N.carrier ↔ x ∈ (N : Set M) :=
Iff.rfl
theorem mem_mk_iff (S : Set M) (h₁ h₂ h₃ h₄) {x : M} :
x ∈ (⟨⟨⟨⟨S, h₁⟩, h₂⟩, h₃⟩, h₄⟩ : LieSubmodule R L M) ↔ x ∈ S :=
Iff.rfl
@[simp]
theorem mem_mk_iff' (p : Submodule R M) (h) {x : M} :
x ∈ (⟨p, h⟩ : LieSubmodule R L M) ↔ x ∈ p :=
Iff.rfl
@[simp]
theorem mem_toSubmodule {x : M} : x ∈ (N : Submodule R M) ↔ x ∈ N :=
Iff.rfl
@[deprecated (since := "2024-12-30")] alias mem_coeSubmodule := mem_toSubmodule
theorem mem_coe {x : M} : x ∈ (N : Set M) ↔ x ∈ N :=
Iff.rfl
@[simp]
protected theorem zero_mem : (0 : M) ∈ N :=
zero_mem N
@[simp]
theorem mk_eq_zero {x} (h : x ∈ N) : (⟨x, h⟩ : N) = 0 ↔ x = 0 :=
Subtype.ext_iff_val
@[simp]
theorem coe_toSet_mk (S : Set M) (h₁ h₂ h₃ h₄) :
((⟨⟨⟨⟨S, h₁⟩, h₂⟩, h₃⟩, h₄⟩ : LieSubmodule R L M) : Set M) = S :=
rfl
theorem toSubmodule_mk (p : Submodule R M) (h) :
(({ p with lie_mem := h } : LieSubmodule R L M) : Submodule R M) = p := by cases p; rfl
@[deprecated (since := "2024-12-30")] alias coe_toSubmodule_mk := toSubmodule_mk
theorem toSubmodule_injective :
Function.Injective (toSubmodule : LieSubmodule R L M → Submodule R M) := fun x y h ↦ by
cases x; cases y; congr
@[deprecated (since := "2024-12-30")] alias coeSubmodule_injective := toSubmodule_injective
@[ext]
theorem ext (h : ∀ m, m ∈ N ↔ m ∈ N') : N = N' :=
SetLike.ext h
@[simp]
theorem toSubmodule_inj : (N : Submodule R M) = (N' : Submodule R M) ↔ N = N' :=
toSubmodule_injective.eq_iff
@[deprecated (since := "2024-12-30")] alias coe_toSubmodule_inj := toSubmodule_inj
@[deprecated (since := "2024-12-29")] alias toSubmodule_eq_iff := toSubmodule_inj
/-- Copy of a `LieSubmodule` with a new `carrier` equal to the old one. Useful to fix definitional
equalities. -/
protected def copy (s : Set M) (hs : s = ↑N) : LieSubmodule R L M where
carrier := s
zero_mem' := by simp [hs]
add_mem' x y := by rw [hs] at x y ⊢; exact N.add_mem' x y
smul_mem' := by exact hs.symm ▸ N.smul_mem'
lie_mem := by exact hs.symm ▸ N.lie_mem
@[simp]
theorem coe_copy (S : LieSubmodule R L M) (s : Set M) (hs : s = ↑S) : (S.copy s hs : Set M) = s :=
rfl
theorem copy_eq (S : LieSubmodule R L M) (s : Set M) (hs : s = ↑S) : S.copy s hs = S :=
SetLike.coe_injective hs
instance : LieRingModule L N where
bracket (x : L) (m : N) := ⟨⁅x, m.val⁆, N.lie_mem m.property⟩
add_lie := by intro x y m; apply SetCoe.ext; apply add_lie
lie_add := by intro x m n; apply SetCoe.ext; apply lie_add
leibniz_lie := by intro x y m; apply SetCoe.ext; apply leibniz_lie
@[simp, norm_cast]
theorem coe_zero : ((0 : N) : M) = (0 : M) :=
rfl
@[simp, norm_cast]
theorem coe_add (m m' : N) : (↑(m + m') : M) = (m : M) + (m' : M) :=
rfl
@[simp, norm_cast]
theorem coe_neg (m : N) : (↑(-m) : M) = -(m : M) :=
rfl
@[simp, norm_cast]
theorem coe_sub (m m' : N) : (↑(m - m') : M) = (m : M) - (m' : M) :=
rfl
@[simp, norm_cast]
theorem coe_smul (t : R) (m : N) : (↑(t • m) : M) = t • (m : M) :=
rfl
@[simp, norm_cast]
theorem coe_bracket (x : L) (m : N) :
(↑⁅x, m⁆ : M) = ⁅x, ↑m⁆ :=
rfl
-- Copying instances from `Submodule` for correct discrimination keys
instance [IsNoetherian R M] (N : LieSubmodule R L M) : IsNoetherian R N :=
inferInstanceAs <| IsNoetherian R N.toSubmodule
instance [IsArtinian R M] (N : LieSubmodule R L M) : IsArtinian R N :=
inferInstanceAs <| IsArtinian R N.toSubmodule
instance [NoZeroSMulDivisors R M] : NoZeroSMulDivisors R N :=
inferInstanceAs <| NoZeroSMulDivisors R N.toSubmodule
variable [LieAlgebra R L] [LieModule R L M]
instance instLieModule : LieModule R L N where
lie_smul := by intro t x y; apply SetCoe.ext; apply lie_smul
smul_lie := by intro t x y; apply SetCoe.ext; apply smul_lie
instance [Subsingleton M] : Unique (LieSubmodule R L M) :=
⟨⟨0⟩, fun _ ↦ (toSubmodule_inj _ _).mp (Subsingleton.elim _ _)⟩
end LieSubmodule
variable {R M}
theorem Submodule.exists_lieSubmodule_coe_eq_iff (p : Submodule R M) :
(∃ N : LieSubmodule R L M, ↑N = p) ↔ ∀ (x : L) (m : M), m ∈ p → ⁅x, m⁆ ∈ p := by
constructor
· rintro ⟨N, rfl⟩ _ _; exact N.lie_mem
· intro h; use { p with lie_mem := @h }
namespace LieSubalgebra
variable {L}
variable [LieAlgebra R L]
variable (K : LieSubalgebra R L)
/-- Given a Lie subalgebra `K ⊆ L`, if we view `L` as a `K`-module by restriction, it contains
a distinguished Lie submodule for the action of `K`, namely `K` itself. -/
def toLieSubmodule : LieSubmodule R K L :=
{ (K : Submodule R L) with lie_mem := fun {x _} hy ↦ K.lie_mem x.property hy }
@[simp]
theorem coe_toLieSubmodule : (K.toLieSubmodule : Submodule R L) = K := rfl
variable {K}
@[simp]
theorem mem_toLieSubmodule (x : L) : x ∈ K.toLieSubmodule ↔ x ∈ K :=
Iff.rfl
end LieSubalgebra
end LieSubmodule
namespace LieSubmodule
variable {R : Type u} {L : Type v} {M : Type w}
variable [CommRing R] [LieRing L] [AddCommGroup M] [Module R M]
variable [LieRingModule L M]
variable (N N' : LieSubmodule R L M)
section LatticeStructure
open Set
theorem coe_injective : Function.Injective ((↑) : LieSubmodule R L M → Set M) :=
SetLike.coe_injective
@[simp, norm_cast]
theorem toSubmodule_le_toSubmodule : (N : Submodule R M) ≤ N' ↔ N ≤ N' :=
Iff.rfl
@[deprecated (since := "2024-12-30")]
alias coeSubmodule_le_coeSubmodule := toSubmodule_le_toSubmodule
instance : Bot (LieSubmodule R L M) :=
⟨0⟩
instance instUniqueBot : Unique (⊥ : LieSubmodule R L M) :=
inferInstanceAs <| Unique (⊥ : Submodule R M)
@[simp]
theorem bot_coe : ((⊥ : LieSubmodule R L M) : Set M) = {0} :=
rfl
@[simp]
theorem bot_toSubmodule : ((⊥ : LieSubmodule R L M) : Submodule R M) = ⊥ :=
rfl
@[deprecated (since := "2024-12-30")] alias bot_coeSubmodule := bot_toSubmodule
@[simp]
theorem toSubmodule_eq_bot : (N : Submodule R M) = ⊥ ↔ N = ⊥ := by
rw [← toSubmodule_inj, bot_toSubmodule]
@[deprecated (since := "2024-12-30")] alias coeSubmodule_eq_bot_iff := toSubmodule_eq_bot
@[simp] theorem mk_eq_bot_iff {N : Submodule R M} {h} :
(⟨N, h⟩ : LieSubmodule R L M) = ⊥ ↔ N = ⊥ := by
rw [← toSubmodule_inj, bot_toSubmodule]
@[simp]
theorem mem_bot (x : M) : x ∈ (⊥ : LieSubmodule R L M) ↔ x = 0 :=
mem_singleton_iff
instance : Top (LieSubmodule R L M) :=
⟨{ (⊤ : Submodule R M) with lie_mem := fun {x m} _ ↦ mem_univ ⁅x, m⁆ }⟩
@[simp]
theorem top_coe : ((⊤ : LieSubmodule R L M) : Set M) = univ :=
rfl
@[simp]
theorem top_toSubmodule : ((⊤ : LieSubmodule R L M) : Submodule R M) = ⊤ :=
rfl
@[deprecated (since := "2024-12-30")] alias top_coeSubmodule := top_toSubmodule
@[simp]
theorem toSubmodule_eq_top : (N : Submodule R M) = ⊤ ↔ N = ⊤ := by
rw [← toSubmodule_inj, top_toSubmodule]
@[deprecated (since := "2024-12-30")] alias coeSubmodule_eq_top_iff := toSubmodule_eq_top
@[simp] theorem mk_eq_top_iff {N : Submodule R M} {h} :
(⟨N, h⟩ : LieSubmodule R L M) = ⊤ ↔ N = ⊤ := by
rw [← toSubmodule_inj, top_toSubmodule]
@[simp]
theorem mem_top (x : M) : x ∈ (⊤ : LieSubmodule R L M) :=
mem_univ x
instance : Min (LieSubmodule R L M) :=
⟨fun N N' ↦
{ (N ⊓ N' : Submodule R M) with
lie_mem := fun h ↦ mem_inter (N.lie_mem h.1) (N'.lie_mem h.2) }⟩
instance : InfSet (LieSubmodule R L M) :=
⟨fun S ↦
{ toSubmodule := sInf {(s : Submodule R M) | s ∈ S}
lie_mem := fun {x m} h ↦ by
simp only [Submodule.mem_carrier, mem_iInter, Submodule.sInf_coe, mem_setOf_eq,
forall_apply_eq_imp_iff₂, forall_exists_index, and_imp] at h ⊢
intro N hN; apply N.lie_mem (h N hN) }⟩
@[simp]
theorem inf_coe : (↑(N ⊓ N') : Set M) = ↑N ∩ ↑N' :=
rfl
@[norm_cast, simp]
theorem inf_toSubmodule :
(↑(N ⊓ N') : Submodule R M) = (N : Submodule R M) ⊓ (N' : Submodule R M) :=
rfl
@[deprecated (since := "2024-12-30")] alias inf_coe_toSubmodule := inf_toSubmodule
@[simp]
theorem sInf_toSubmodule (S : Set (LieSubmodule R L M)) :
(↑(sInf S) : Submodule R M) = sInf {(s : Submodule R M) | s ∈ S} :=
rfl
@[deprecated (since := "2024-12-30")] alias sInf_coe_toSubmodule := sInf_toSubmodule
theorem sInf_toSubmodule_eq_iInf (S : Set (LieSubmodule R L M)) :
(↑(sInf S) : Submodule R M) = ⨅ N ∈ S, (N : Submodule R M) := by
rw [sInf_toSubmodule, ← Set.image, sInf_image]
@[deprecated (since := "2024-12-30")] alias sInf_coe_toSubmodule' := sInf_toSubmodule_eq_iInf
@[simp]
theorem iInf_toSubmodule {ι} (p : ι → LieSubmodule R L M) :
(↑(⨅ i, p i) : Submodule R M) = ⨅ i, (p i : Submodule R M) := by
rw [iInf, sInf_toSubmodule]; ext; simp
@[deprecated (since := "2024-12-30")] alias iInf_coe_toSubmodule := iInf_toSubmodule
@[simp]
theorem sInf_coe (S : Set (LieSubmodule R L M)) : (↑(sInf S) : Set M) = ⋂ s ∈ S, (s : Set M) := by
rw [← LieSubmodule.coe_toSubmodule, sInf_toSubmodule, Submodule.sInf_coe]
ext m
simp only [mem_iInter, mem_setOf_eq, forall_apply_eq_imp_iff₂, exists_imp,
and_imp, SetLike.mem_coe, mem_toSubmodule]
@[simp]
theorem iInf_coe {ι} (p : ι → LieSubmodule R L M) : (↑(⨅ i, p i) : Set M) = ⋂ i, ↑(p i) := by
rw [iInf, sInf_coe]; simp only [Set.mem_range, Set.iInter_exists, Set.iInter_iInter_eq']
@[simp]
theorem mem_iInf {ι} (p : ι → LieSubmodule R L M) {x} : (x ∈ ⨅ i, p i) ↔ ∀ i, x ∈ p i := by
rw [← SetLike.mem_coe, iInf_coe, Set.mem_iInter]; rfl
instance : Max (LieSubmodule R L M) where
max N N' :=
{ toSubmodule := (N : Submodule R M) ⊔ (N' : Submodule R M)
lie_mem := by
rintro x m (hm : m ∈ (N : Submodule R M) ⊔ (N' : Submodule R M))
change ⁅x, m⁆ ∈ (N : Submodule R M) ⊔ (N' : Submodule R M)
rw [Submodule.mem_sup] at hm ⊢
obtain ⟨y, hy, z, hz, rfl⟩ := hm
exact ⟨⁅x, y⁆, N.lie_mem hy, ⁅x, z⁆, N'.lie_mem hz, (lie_add _ _ _).symm⟩ }
instance : SupSet (LieSubmodule R L M) where
sSup S :=
{ toSubmodule := sSup {(p : Submodule R M) | p ∈ S}
lie_mem := by
intro x m (hm : m ∈ sSup {(p : Submodule R M) | p ∈ S})
change ⁅x, m⁆ ∈ sSup {(p : Submodule R M) | p ∈ S}
obtain ⟨s, hs, hsm⟩ := Submodule.mem_sSup_iff_exists_finset.mp hm
clear hm
classical
induction s using Finset.induction_on generalizing m with
| empty =>
replace hsm : m = 0 := by simpa using hsm
simp [hsm]
| | insert q t hqt ih =>
rw [Finset.iSup_insert] at hsm
| Mathlib/Algebra/Lie/Submodule.lean | 401 | 402 |
/-
Copyright (c) 2020 Kim Morrison. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Kim Morrison
-/
import Mathlib.Algebra.Algebra.Hom
import Mathlib.RingTheory.Congruence.Basic
import Mathlib.RingTheory.Ideal.Quotient.Defs
import Mathlib.RingTheory.Ideal.Span
/-!
# Quotients of semirings
In this file, we directly define the quotient of a semiring by any relation,
by building a bigger relation that represents the ideal generated by that relation.
We prove the universal properties of the quotient, and recommend avoiding relying on the actual
definition, which is made irreducible for this purpose.
Since everything runs in parallel for quotients of `R`-algebras, we do that case at the same time.
-/
assert_not_exists Star.star
universe uR uS uT uA u₄
variable {R : Type uR} [Semiring R]
variable {S : Type uS} [CommSemiring S]
variable {T : Type uT}
variable {A : Type uA} [Semiring A] [Algebra S A]
namespace RingCon
instance (c : RingCon A) : Algebra S c.Quotient where
smul := (· • ·)
algebraMap := c.mk'.comp (algebraMap S A)
commutes' _ := Quotient.ind' fun _ ↦ congr_arg Quotient.mk'' <| Algebra.commutes _ _
smul_def' _ := Quotient.ind' fun _ ↦ congr_arg Quotient.mk'' <| Algebra.smul_def _ _
@[simp, norm_cast]
theorem coe_algebraMap (c : RingCon A) (s : S) :
(algebraMap S A s : c.Quotient) = algebraMap S _ s :=
rfl
end RingCon
namespace RingQuot
/-- Given an arbitrary relation `r` on a ring, we strengthen it to a relation `Rel r`,
such that the equivalence relation generated by `Rel r` has `x ~ y` if and only if
`x - y` is in the ideal generated by elements `a - b` such that `r a b`.
-/
inductive Rel (r : R → R → Prop) : R → R → Prop
| of ⦃x y : R⦄ (h : r x y) : Rel r x y
| add_left ⦃a b c⦄ : Rel r a b → Rel r (a + c) (b + c)
| mul_left ⦃a b c⦄ : Rel r a b → Rel r (a * c) (b * c)
| mul_right ⦃a b c⦄ : Rel r b c → Rel r (a * b) (a * c)
theorem Rel.add_right {r : R → R → Prop} ⦃a b c : R⦄ (h : Rel r b c) : Rel r (a + b) (a + c) := by
rw [add_comm a b, add_comm a c]
exact Rel.add_left h
theorem Rel.neg {R : Type uR} [Ring R] {r : R → R → Prop} ⦃a b : R⦄ (h : Rel r a b) :
Rel r (-a) (-b) := by simp only [neg_eq_neg_one_mul a, neg_eq_neg_one_mul b, Rel.mul_right h]
theorem Rel.sub_left {R : Type uR} [Ring R] {r : R → R → Prop} ⦃a b c : R⦄ (h : Rel r a b) :
Rel r (a - c) (b - c) := by simp only [sub_eq_add_neg, h.add_left]
theorem Rel.sub_right {R : Type uR} [Ring R] {r : R → R → Prop} ⦃a b c : R⦄ (h : Rel r b c) :
Rel r (a - b) (a - c) := by simp only [sub_eq_add_neg, h.neg.add_right]
theorem Rel.smul {r : A → A → Prop} (k : S) ⦃a b : A⦄ (h : Rel r a b) : Rel r (k • a) (k • b) := by
simp only [Algebra.smul_def, Rel.mul_right h]
/-- `EqvGen (RingQuot.Rel r)` is a ring congruence. -/
def ringCon (r : R → R → Prop) : RingCon R where
r := Relation.EqvGen (Rel r)
iseqv := Relation.EqvGen.is_equivalence _
add' {a b c d} hab hcd := by
induction hab generalizing c d with
| rel _ _ hab =>
refine (Relation.EqvGen.rel _ _ hab.add_left).trans _ _ _ ?_
induction hcd with
| rel _ _ hcd => exact Relation.EqvGen.rel _ _ hcd.add_right
| refl => exact Relation.EqvGen.refl _
| symm _ _ _ h => exact h.symm _ _
| trans _ _ _ _ _ h h' => exact h.trans _ _ _ h'
| refl => induction hcd with
| rel _ _ hcd => exact Relation.EqvGen.rel _ _ hcd.add_right
| refl => exact Relation.EqvGen.refl _
| symm _ _ _ h => exact h.symm _ _
| trans _ _ _ _ _ h h' => exact h.trans _ _ _ h'
| symm x y _ hxy => exact (hxy hcd.symm).symm
| trans x y z _ _ h h' => exact (h hcd).trans _ _ _ (h' <| Relation.EqvGen.refl _)
mul' {a b c d} hab hcd := by
induction hab generalizing c d with
| rel _ _ hab =>
refine (Relation.EqvGen.rel _ _ hab.mul_left).trans _ _ _ ?_
induction hcd with
| rel _ _ hcd => exact Relation.EqvGen.rel _ _ hcd.mul_right
| refl => exact Relation.EqvGen.refl _
| symm _ _ _ h => exact h.symm _ _
| trans _ _ _ _ _ h h' => exact h.trans _ _ _ h'
| refl => induction hcd with
| rel _ _ hcd => exact Relation.EqvGen.rel _ _ hcd.mul_right
| refl => exact Relation.EqvGen.refl _
| symm _ _ _ h => exact h.symm _ _
| trans _ _ _ _ _ h h' => exact h.trans _ _ _ h'
| symm x y _ hxy => exact (hxy hcd.symm).symm
| trans x y z _ _ h h' => exact (h hcd).trans _ _ _ (h' <| Relation.EqvGen.refl _)
theorem eqvGen_rel_eq (r : R → R → Prop) : Relation.EqvGen (Rel r) = RingConGen.Rel r := by
ext x₁ x₂
constructor
· intro h
induction h with
| rel _ _ h => induction h with
| of => exact RingConGen.Rel.of _ _ ‹_›
| add_left _ h => exact h.add (RingConGen.Rel.refl _)
| mul_left _ h => exact h.mul (RingConGen.Rel.refl _)
| mul_right _ h => exact (RingConGen.Rel.refl _).mul h
| refl => exact RingConGen.Rel.refl _
| symm => exact RingConGen.Rel.symm ‹_›
| trans => exact RingConGen.Rel.trans ‹_› ‹_›
· intro h
induction h with
| of => exact Relation.EqvGen.rel _ _ (Rel.of ‹_›)
| refl => exact (RingQuot.ringCon r).refl _
| symm => exact (RingQuot.ringCon r).symm ‹_›
| trans => exact (RingQuot.ringCon r).trans ‹_› ‹_›
| add => exact (RingQuot.ringCon r).add ‹_› ‹_›
| mul => exact (RingQuot.ringCon r).mul ‹_› ‹_›
end RingQuot
/-- The quotient of a ring by an arbitrary relation. -/
structure RingQuot (r : R → R → Prop) where
toQuot : Quot (RingQuot.Rel r)
namespace RingQuot
variable (r : R → R → Prop)
-- can't be irreducible, causes diamonds in ℕ-algebras
private def natCast (n : ℕ) : RingQuot r :=
⟨Quot.mk _ n⟩
private irreducible_def zero : RingQuot r :=
⟨Quot.mk _ 0⟩
private irreducible_def one : RingQuot r :=
⟨Quot.mk _ 1⟩
private irreducible_def add : RingQuot r → RingQuot r → RingQuot r
| ⟨a⟩, ⟨b⟩ => ⟨Quot.map₂ (· + ·) Rel.add_right Rel.add_left a b⟩
private irreducible_def mul : RingQuot r → RingQuot r → RingQuot r
| ⟨a⟩, ⟨b⟩ => ⟨Quot.map₂ (· * ·) Rel.mul_right Rel.mul_left a b⟩
private irreducible_def neg {R : Type uR} [Ring R] (r : R → R → Prop) : RingQuot r → RingQuot r
| ⟨a⟩ => ⟨Quot.map (fun a ↦ -a) Rel.neg a⟩
private irreducible_def sub {R : Type uR} [Ring R] (r : R → R → Prop) :
RingQuot r → RingQuot r → RingQuot r
| ⟨a⟩, ⟨b⟩ => ⟨Quot.map₂ Sub.sub Rel.sub_right Rel.sub_left a b⟩
private irreducible_def npow (n : ℕ) : RingQuot r → RingQuot r
| ⟨a⟩ =>
⟨Quot.lift (fun a ↦ Quot.mk (RingQuot.Rel r) (a ^ n))
(fun a b (h : Rel r a b) ↦ by
-- note we can't define a `Rel.pow` as `Rel` isn't reflexive so `Rel r 1 1` isn't true
dsimp only
induction n with
| zero => rw [pow_zero, pow_zero]
| succ n ih =>
simpa only [pow_succ, mul_def, Quot.map₂_mk, mk.injEq] using
congr_arg₂ (fun x y ↦ mul r ⟨x⟩ ⟨y⟩) ih (Quot.sound h))
a⟩
-- note: this cannot be irreducible, as otherwise diamonds don't commute.
private def smul [Algebra S R] (n : S) : RingQuot r → RingQuot r
| ⟨a⟩ => ⟨Quot.map (fun a ↦ n • a) (Rel.smul n) a⟩
instance : NatCast (RingQuot r) :=
⟨natCast r⟩
instance : Zero (RingQuot r) :=
⟨zero r⟩
instance : One (RingQuot r) :=
⟨one r⟩
instance : Add (RingQuot r) :=
⟨add r⟩
instance : Mul (RingQuot r) :=
⟨mul r⟩
instance : NatPow (RingQuot r) :=
⟨fun x n ↦ npow r n x⟩
instance {R : Type uR} [Ring R] (r : R → R → Prop) : Neg (RingQuot r) :=
⟨neg r⟩
instance {R : Type uR} [Ring R] (r : R → R → Prop) : Sub (RingQuot r) :=
⟨sub r⟩
instance [Algebra S R] : SMul S (RingQuot r) :=
⟨smul r⟩
theorem zero_quot : (⟨Quot.mk _ 0⟩ : RingQuot r) = 0 :=
show _ = zero r by rw [zero_def]
theorem one_quot : (⟨Quot.mk _ 1⟩ : RingQuot r) = 1 :=
show _ = one r by rw [one_def]
theorem add_quot {a b} : (⟨Quot.mk _ a⟩ + ⟨Quot.mk _ b⟩ : RingQuot r) = ⟨Quot.mk _ (a + b)⟩ := by
show add r _ _ = _
rw [add_def]
rfl
theorem mul_quot {a b} : (⟨Quot.mk _ a⟩ * ⟨Quot.mk _ b⟩ : RingQuot r) = ⟨Quot.mk _ (a * b)⟩ := by
show mul r _ _ = _
rw [mul_def]
rfl
theorem pow_quot {a} {n : ℕ} : (⟨Quot.mk _ a⟩ ^ n : RingQuot r) = ⟨Quot.mk _ (a ^ n)⟩ := by
show npow r _ _ = _
rw [npow_def]
|
theorem neg_quot {R : Type uR} [Ring R] (r : R → R → Prop) {a} :
| Mathlib/Algebra/RingQuot.lean | 230 | 231 |
/-
Copyright (c) 2020 Patrick Massot. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Patrick Massot
-/
import Mathlib.Topology.Path
/-!
# Path connectedness
Continuing from `Mathlib.Topology.Path`, this file defines path components and path-connected
spaces.
## Main definitions
In the file the unit interval `[0, 1]` in `ℝ` is denoted by `I`, and `X` is a topological space.
* `Joined (x y : X)` means there is a path between `x` and `y`.
* `Joined.somePath (h : Joined x y)` selects some path between two points `x` and `y`.
* `pathComponent (x : X)` is the set of points joined to `x`.
* `PathConnectedSpace X` is a predicate class asserting that `X` is non-empty and every two
points of `X` are joined.
Then there are corresponding relative notions for `F : Set X`.
* `JoinedIn F (x y : X)` means there is a path `γ` joining `x` to `y` with values in `F`.
* `JoinedIn.somePath (h : JoinedIn F x y)` selects a path from `x` to `y` inside `F`.
* `pathComponentIn F (x : X)` is the set of points joined to `x` in `F`.
* `IsPathConnected F` asserts that `F` is non-empty and every two
points of `F` are joined in `F`.
## Main theorems
* `Joined` is an equivalence relation, while `JoinedIn F` is at least symmetric and transitive.
One can link the absolute and relative version in two directions, using `(univ : Set X)` or the
subtype `↥F`.
* `pathConnectedSpace_iff_univ : PathConnectedSpace X ↔ IsPathConnected (univ : Set X)`
* `isPathConnected_iff_pathConnectedSpace : IsPathConnected F ↔ PathConnectedSpace ↥F`
Furthermore, it is shown that continuous images and quotients of path-connected sets/spaces are
path-connected, and that every path-connected set/space is also connected.
-/
noncomputable section
open Topology Filter unitInterval Set Function
variable {X Y : Type*} [TopologicalSpace X] [TopologicalSpace Y] {x y z : X} {ι : Type*}
/-! ### Being joined by a path -/
/-- The relation "being joined by a path". This is an equivalence relation. -/
def Joined (x y : X) : Prop :=
Nonempty (Path x y)
@[refl]
theorem Joined.refl (x : X) : Joined x x :=
⟨Path.refl x⟩
/-- When two points are joined, choose some path from `x` to `y`. -/
def Joined.somePath (h : Joined x y) : Path x y :=
Nonempty.some h
@[symm]
theorem Joined.symm {x y : X} (h : Joined x y) : Joined y x :=
⟨h.somePath.symm⟩
@[trans]
theorem Joined.trans {x y z : X} (hxy : Joined x y) (hyz : Joined y z) : Joined x z :=
⟨hxy.somePath.trans hyz.somePath⟩
variable (X)
/-- The setoid corresponding the equivalence relation of being joined by a continuous path. -/
def pathSetoid : Setoid X where
r := Joined
iseqv := Equivalence.mk Joined.refl Joined.symm Joined.trans
/-- The quotient type of points of a topological space modulo being joined by a continuous path. -/
def ZerothHomotopy :=
Quotient (pathSetoid X)
instance ZerothHomotopy.inhabited : Inhabited (ZerothHomotopy ℝ) :=
⟨@Quotient.mk' ℝ (pathSetoid ℝ) 0⟩
variable {X}
/-! ### Being joined by a path inside a set -/
/-- The relation "being joined by a path in `F`". Not quite an equivalence relation since it's not
reflexive for points that do not belong to `F`. -/
def JoinedIn (F : Set X) (x y : X) : Prop :=
∃ γ : Path x y, ∀ t, γ t ∈ F
variable {F : Set X}
theorem JoinedIn.mem (h : JoinedIn F x y) : x ∈ F ∧ y ∈ F := by
rcases h with ⟨γ, γ_in⟩
have : γ 0 ∈ F ∧ γ 1 ∈ F := by constructor <;> apply γ_in
simpa using this
theorem JoinedIn.source_mem (h : JoinedIn F x y) : x ∈ F :=
h.mem.1
theorem JoinedIn.target_mem (h : JoinedIn F x y) : y ∈ F :=
h.mem.2
/-- When `x` and `y` are joined in `F`, choose a path from `x` to `y` inside `F` -/
def JoinedIn.somePath (h : JoinedIn F x y) : Path x y :=
Classical.choose h
theorem JoinedIn.somePath_mem (h : JoinedIn F x y) (t : I) : h.somePath t ∈ F :=
Classical.choose_spec h t
/-- If `x` and `y` are joined in the set `F`, then they are joined in the subtype `F`. -/
theorem JoinedIn.joined_subtype (h : JoinedIn F x y) :
Joined (⟨x, h.source_mem⟩ : F) (⟨y, h.target_mem⟩ : F) :=
⟨{ toFun := fun t => ⟨h.somePath t, h.somePath_mem t⟩
continuous_toFun := by fun_prop
source' := by simp
target' := by simp }⟩
theorem JoinedIn.ofLine {f : ℝ → X} (hf : ContinuousOn f I) (h₀ : f 0 = x) (h₁ : f 1 = y)
(hF : f '' I ⊆ F) : JoinedIn F x y :=
⟨Path.ofLine hf h₀ h₁, fun t => hF <| Path.ofLine_mem hf h₀ h₁ t⟩
theorem JoinedIn.joined (h : JoinedIn F x y) : Joined x y :=
⟨h.somePath⟩
theorem joinedIn_iff_joined (x_in : x ∈ F) (y_in : y ∈ F) :
JoinedIn F x y ↔ Joined (⟨x, x_in⟩ : F) (⟨y, y_in⟩ : F) :=
⟨fun h => h.joined_subtype, fun h => ⟨h.somePath.map continuous_subtype_val, by simp⟩⟩
@[simp]
theorem joinedIn_univ : JoinedIn univ x y ↔ Joined x y := by
simp [JoinedIn, Joined, exists_true_iff_nonempty]
theorem JoinedIn.mono {U V : Set X} (h : JoinedIn U x y) (hUV : U ⊆ V) : JoinedIn V x y :=
⟨h.somePath, fun t => hUV (h.somePath_mem t)⟩
theorem JoinedIn.refl (h : x ∈ F) : JoinedIn F x x :=
⟨Path.refl x, fun _t => h⟩
@[symm]
theorem JoinedIn.symm (h : JoinedIn F x y) : JoinedIn F y x := by
obtain ⟨hx, hy⟩ := h.mem
simp_all only [joinedIn_iff_joined]
exact h.symm
theorem JoinedIn.trans (hxy : JoinedIn F x y) (hyz : JoinedIn F y z) : JoinedIn F x z := by
obtain ⟨hx, hy⟩ := hxy.mem
obtain ⟨hx, hy⟩ := hyz.mem
simp_all only [joinedIn_iff_joined]
exact hxy.trans hyz
theorem Specializes.joinedIn (h : x ⤳ y) (hx : x ∈ F) (hy : y ∈ F) : JoinedIn F x y := by
refine ⟨⟨⟨Set.piecewise {1} (const I y) (const I x), ?_⟩, by simp, by simp⟩, fun t ↦ ?_⟩
· exact isClosed_singleton.continuous_piecewise_of_specializes continuous_const continuous_const
fun _ ↦ h
· simp only [Path.coe_mk_mk, piecewise]
split_ifs <;> assumption
theorem Inseparable.joinedIn (h : Inseparable x y) (hx : x ∈ F) (hy : y ∈ F) : JoinedIn F x y :=
h.specializes.joinedIn hx hy
theorem JoinedIn.map_continuousOn (h : JoinedIn F x y) {f : X → Y} (hf : ContinuousOn f F) :
JoinedIn (f '' F) (f x) (f y) :=
let ⟨γ, hγ⟩ := h
⟨γ.map' <| hf.mono (range_subset_iff.mpr hγ), fun t ↦ mem_image_of_mem _ (hγ t)⟩
theorem JoinedIn.map (h : JoinedIn F x y) {f : X → Y} (hf : Continuous f) :
JoinedIn (f '' F) (f x) (f y) :=
h.map_continuousOn hf.continuousOn
theorem Topology.IsInducing.joinedIn_image {f : X → Y} (hf : IsInducing f) (hx : x ∈ F)
(hy : y ∈ F) : JoinedIn (f '' F) (f x) (f y) ↔ JoinedIn F x y := by
refine ⟨?_, (.map · hf.continuous)⟩
rintro ⟨γ, hγ⟩
choose γ' hγ'F hγ' using hγ
have h₀ : x ⤳ γ' 0 := by rw [← hf.specializes_iff, hγ', γ.source]
have h₁ : γ' 1 ⤳ y := by rw [← hf.specializes_iff, hγ', γ.target]
have h : JoinedIn F (γ' 0) (γ' 1) := by
refine ⟨⟨⟨γ', ?_⟩, rfl, rfl⟩, hγ'F⟩
simpa only [hf.continuous_iff, comp_def, hγ'] using map_continuous γ
exact (h₀.joinedIn hx (hγ'F _)).trans <| h.trans <| h₁.joinedIn (hγ'F _) hy
@[deprecated (since := "2024-10-28")] alias Inducing.joinedIn_image := IsInducing.joinedIn_image
/-! ### Path component -/
/-- The path component of `x` is the set of points that can be joined to `x`. -/
def pathComponent (x : X) :=
{ y | Joined x y }
theorem mem_pathComponent_iff : x ∈ pathComponent y ↔ Joined y x := .rfl
@[simp]
theorem mem_pathComponent_self (x : X) : x ∈ pathComponent x :=
Joined.refl x
@[simp]
theorem pathComponent.nonempty (x : X) : (pathComponent x).Nonempty :=
⟨x, mem_pathComponent_self x⟩
theorem mem_pathComponent_of_mem (h : x ∈ pathComponent y) : y ∈ pathComponent x :=
Joined.symm h
theorem pathComponent_symm : x ∈ pathComponent y ↔ y ∈ pathComponent x :=
⟨fun h => mem_pathComponent_of_mem h, fun h => mem_pathComponent_of_mem h⟩
theorem pathComponent_congr (h : x ∈ pathComponent y) : pathComponent x = pathComponent y := by
ext z
constructor
· intro h'
rw [pathComponent_symm]
exact (h.trans h').symm
· intro h'
rw [pathComponent_symm] at h' ⊢
exact h'.trans h
theorem pathComponent_subset_component (x : X) : pathComponent x ⊆ connectedComponent x :=
fun y h =>
(isConnected_range h.somePath.continuous).subset_connectedComponent ⟨0, by simp⟩ ⟨1, by simp⟩
/-- The path component of `x` in `F` is the set of points that can be joined to `x` in `F`. -/
def pathComponentIn (x : X) (F : Set X) :=
{ y | JoinedIn F x y }
@[simp]
theorem pathComponentIn_univ (x : X) : pathComponentIn x univ = pathComponent x := by
simp [pathComponentIn, pathComponent, JoinedIn, Joined, exists_true_iff_nonempty]
theorem Joined.mem_pathComponent (hyz : Joined y z) (hxy : y ∈ pathComponent x) :
z ∈ pathComponent x :=
hxy.trans hyz
theorem mem_pathComponentIn_self (h : x ∈ F) : x ∈ pathComponentIn x F :=
JoinedIn.refl h
theorem pathComponentIn_subset : pathComponentIn x F ⊆ F :=
fun _ hy ↦ hy.target_mem
theorem pathComponentIn_nonempty_iff : (pathComponentIn x F).Nonempty ↔ x ∈ F :=
⟨fun ⟨_, ⟨γ, hγ⟩⟩ ↦ γ.source ▸ hγ 0, fun hx ↦ ⟨x, mem_pathComponentIn_self hx⟩⟩
theorem pathComponentIn_congr (h : x ∈ pathComponentIn y F) :
pathComponentIn x F = pathComponentIn y F := by
ext; exact ⟨h.trans, h.symm.trans⟩
@[gcongr]
theorem pathComponentIn_mono {G : Set X} (h : F ⊆ G) :
pathComponentIn x F ⊆ pathComponentIn x G :=
fun _ ⟨γ, hγ⟩ ↦ ⟨γ, fun t ↦ h (hγ t)⟩
/-! ### Path connected sets -/
/-- A set `F` is path connected if it contains a point that can be joined to all other in `F`. -/
def IsPathConnected (F : Set X) : Prop :=
∃ x ∈ F, ∀ {y}, y ∈ F → JoinedIn F x y
theorem isPathConnected_iff_eq : IsPathConnected F ↔ ∃ x ∈ F, pathComponentIn x F = F := by
constructor <;> rintro ⟨x, x_in, h⟩ <;> use x, x_in
· ext y
exact ⟨fun hy => hy.mem.2, h⟩
· intro y y_in
rwa [← h] at y_in
theorem IsPathConnected.joinedIn (h : IsPathConnected F) :
∀ᵉ (x ∈ F) (y ∈ F), JoinedIn F x y := fun _x x_in _y y_in =>
let ⟨_b, _b_in, hb⟩ := h
(hb x_in).symm.trans (hb y_in)
theorem isPathConnected_iff :
IsPathConnected F ↔ F.Nonempty ∧ ∀ᵉ (x ∈ F) (y ∈ F), JoinedIn F x y :=
⟨fun h =>
⟨let ⟨b, b_in, _hb⟩ := h; ⟨b, b_in⟩, h.joinedIn⟩,
fun ⟨⟨b, b_in⟩, h⟩ => ⟨b, b_in, fun x_in => h _ b_in _ x_in⟩⟩
/-- If `f` is continuous on `F` and `F` is path-connected, so is `f(F)`. -/
theorem IsPathConnected.image' (hF : IsPathConnected F)
{f : X → Y} (hf : ContinuousOn f F) : IsPathConnected (f '' F) := by
rcases hF with ⟨x, x_in, hx⟩
use f x, mem_image_of_mem f x_in
rintro _ ⟨y, y_in, rfl⟩
refine ⟨(hx y_in).somePath.map' ?_, fun t ↦ ⟨_, (hx y_in).somePath_mem t, rfl⟩⟩
exact hf.mono (range_subset_iff.2 (hx y_in).somePath_mem)
/-- If `f` is continuous and `F` is path-connected, so is `f(F)`. -/
theorem IsPathConnected.image (hF : IsPathConnected F) {f : X → Y} (hf : Continuous f) :
IsPathConnected (f '' F) :=
hF.image' hf.continuousOn
/-- If `f : X → Y` is an inducing map, `f(F)` is path-connected iff `F` is. -/
nonrec theorem Topology.IsInducing.isPathConnected_iff {f : X → Y} (hf : IsInducing f) :
IsPathConnected F ↔ IsPathConnected (f '' F) := by
simp only [IsPathConnected, forall_mem_image, exists_mem_image]
refine exists_congr fun x ↦ and_congr_right fun hx ↦ forall₂_congr fun y hy ↦ ?_
rw [hf.joinedIn_image hx hy]
@[deprecated (since := "2024-10-28")]
alias Inducing.isPathConnected_iff := IsInducing.isPathConnected_iff
/-- If `h : X → Y` is a homeomorphism, `h(s)` is path-connected iff `s` is. -/
@[simp]
theorem Homeomorph.isPathConnected_image {s : Set X} (h : X ≃ₜ Y) :
IsPathConnected (h '' s) ↔ IsPathConnected s :=
h.isInducing.isPathConnected_iff.symm
/-- If `h : X → Y` is a homeomorphism, `h⁻¹(s)` is path-connected iff `s` is. -/
@[simp]
theorem Homeomorph.isPathConnected_preimage {s : Set Y} (h : X ≃ₜ Y) :
IsPathConnected (h ⁻¹' s) ↔ IsPathConnected s := by
rw [← Homeomorph.image_symm]; exact h.symm.isPathConnected_image
theorem IsPathConnected.mem_pathComponent (h : IsPathConnected F) (x_in : x ∈ F) (y_in : y ∈ F) :
y ∈ pathComponent x :=
(h.joinedIn x x_in y y_in).joined
theorem IsPathConnected.subset_pathComponent (h : IsPathConnected F) (x_in : x ∈ F) :
F ⊆ pathComponent x := fun _y y_in => h.mem_pathComponent x_in y_in
theorem IsPathConnected.subset_pathComponentIn {s : Set X} (hs : IsPathConnected s)
(hxs : x ∈ s) (hsF : s ⊆ F) : s ⊆ pathComponentIn x F :=
fun y hys ↦ (hs.joinedIn x hxs y hys).mono hsF
theorem isPathConnected_singleton (x : X) : IsPathConnected ({x} : Set X) := by
refine ⟨x, rfl, ?_⟩
rintro y rfl
exact JoinedIn.refl rfl
theorem isPathConnected_pathComponentIn (h : x ∈ F) : IsPathConnected (pathComponentIn x F) :=
⟨x, mem_pathComponentIn_self h, fun ⟨γ, hγ⟩ ↦ by
refine ⟨γ, fun t ↦
⟨(γ.truncateOfLE t.2.1).cast (γ.extend_zero.symm) (γ.extend_extends' t).symm, fun t' ↦ ?_⟩⟩
dsimp [Path.truncateOfLE, Path.truncate]
exact γ.extend_extends' ⟨min (max t'.1 0) t.1, by simp [t.2.1, t.2.2]⟩ ▸ hγ _⟩
theorem isPathConnected_pathComponent : IsPathConnected (pathComponent x) := by
rw [← pathComponentIn_univ]
exact isPathConnected_pathComponentIn (mem_univ x)
theorem IsPathConnected.union {U V : Set X} (hU : IsPathConnected U) (hV : IsPathConnected V)
(hUV : (U ∩ V).Nonempty) : IsPathConnected (U ∪ V) := by
rcases hUV with ⟨x, xU, xV⟩
use x, Or.inl xU
rintro y (yU | yV)
· exact (hU.joinedIn x xU y yU).mono subset_union_left
· exact (hV.joinedIn x xV y yV).mono subset_union_right
/-- If a set `W` is path-connected, then it is also path-connected when seen as a set in a smaller
ambient type `U` (when `U` contains `W`). -/
theorem IsPathConnected.preimage_coe {U W : Set X} (hW : IsPathConnected W) (hWU : W ⊆ U) :
IsPathConnected (((↑) : U → X) ⁻¹' W) := by
rwa [IsInducing.subtypeVal.isPathConnected_iff, Subtype.image_preimage_val, inter_eq_right.2 hWU]
theorem IsPathConnected.exists_path_through_family {n : ℕ}
{s : Set X} (h : IsPathConnected s) (p : Fin (n + 1) → X) (hp : ∀ i, p i ∈ s) :
∃ γ : Path (p 0) (p n), range γ ⊆ s ∧ ∀ i, p i ∈ range γ := by
let p' : ℕ → X := fun k => if h : k < n + 1 then p ⟨k, h⟩ else p ⟨0, n.zero_lt_succ⟩
obtain ⟨γ, hγ⟩ : ∃ γ : Path (p' 0) (p' n), (∀ i ≤ n, p' i ∈ range γ) ∧ range γ ⊆ s := by
have hp' : ∀ i ≤ n, p' i ∈ s := by
intro i hi
simp [p', Nat.lt_succ_of_le hi, hp]
clear_value p'
clear hp p
induction n with
| zero =>
use Path.refl (p' 0)
constructor
· rintro i hi
rw [Nat.le_zero.mp hi]
exact ⟨0, rfl⟩
· rw [range_subset_iff]
rintro _x
exact hp' 0 le_rfl
| succ n hn =>
rcases hn fun i hi => hp' i <| Nat.le_succ_of_le hi with ⟨γ₀, hγ₀⟩
rcases h.joinedIn (p' n) (hp' n n.le_succ) (p' <| n + 1) (hp' (n + 1) <| le_rfl) with
⟨γ₁, hγ₁⟩
let γ : Path (p' 0) (p' <| n + 1) := γ₀.trans γ₁
use γ
have range_eq : range γ = range γ₀ ∪ range γ₁ := γ₀.trans_range γ₁
constructor
· rintro i hi
by_cases hi' : i ≤ n
· rw [range_eq]
left
exact hγ₀.1 i hi'
· rw [not_le, ← Nat.succ_le_iff] at hi'
have : i = n.succ := le_antisymm hi hi'
rw [this]
use 1
exact γ.target
· rw [range_eq]
apply union_subset hγ₀.2
rw [range_subset_iff]
exact hγ₁
have hpp' : ∀ k < n + 1, p k = p' k := by
intro k hk
simp only [p', hk, dif_pos]
congr
ext
rw [Fin.val_cast_of_lt hk]
use γ.cast (hpp' 0 n.zero_lt_succ) (hpp' n n.lt_succ_self)
simp only [γ.cast_coe]
refine And.intro hγ.2 ?_
rintro ⟨i, hi⟩
suffices p ⟨i, hi⟩ = p' i by convert hγ.1 i (Nat.le_of_lt_succ hi)
rw [← hpp' i hi]
suffices i = i % n.succ by congr
rw [Nat.mod_eq_of_lt hi]
theorem IsPathConnected.exists_path_through_family' {n : ℕ}
{s : Set X} (h : IsPathConnected s) (p : Fin (n + 1) → X) (hp : ∀ i, p i ∈ s) :
∃ (γ : Path (p 0) (p n)) (t : Fin (n + 1) → I), (∀ t, γ t ∈ s) ∧ ∀ i, γ (t i) = p i := by
rcases h.exists_path_through_family p hp with ⟨γ, hγ⟩
rcases hγ with ⟨h₁, h₂⟩
simp only [range, mem_setOf_eq] at h₂
rw [range_subset_iff] at h₁
choose! t ht using h₂
exact ⟨γ, t, h₁, ht⟩
/-! ### Path connected spaces -/
/-- A topological space is path-connected if it is non-empty and every two points can be
joined by a continuous path. -/
@[mk_iff]
class PathConnectedSpace (X : Type*) [TopologicalSpace X] : Prop where
/-- A path-connected space must be nonempty. -/
nonempty : Nonempty X
/-- Any two points in a path-connected space must be joined by a continuous path. -/
joined : ∀ x y : X, Joined x y
theorem pathConnectedSpace_iff_zerothHomotopy :
PathConnectedSpace X ↔ Nonempty (ZerothHomotopy X) ∧ Subsingleton (ZerothHomotopy X) := by
letI := pathSetoid X
constructor
· intro h
refine ⟨(nonempty_quotient_iff _).mpr h.1, ⟨?_⟩⟩
rintro ⟨x⟩ ⟨y⟩
exact Quotient.sound (PathConnectedSpace.joined x y)
· unfold ZerothHomotopy
rintro ⟨h, h'⟩
exact ⟨(nonempty_quotient_iff _).mp h, fun x y => Quotient.exact <| Subsingleton.elim ⟦x⟧ ⟦y⟧⟩
namespace PathConnectedSpace
variable [PathConnectedSpace X]
/-- Use path-connectedness to build a path between two points. -/
def somePath (x y : X) : Path x y :=
Nonempty.some (joined x y)
end PathConnectedSpace
theorem pathConnectedSpace_iff_univ : PathConnectedSpace X ↔ IsPathConnected (univ : Set X) := by
simp [pathConnectedSpace_iff, isPathConnected_iff, nonempty_iff_univ_nonempty]
theorem isPathConnected_iff_pathConnectedSpace : IsPathConnected F ↔ PathConnectedSpace F := by
rw [pathConnectedSpace_iff_univ, IsInducing.subtypeVal.isPathConnected_iff, image_univ,
Subtype.range_val_subtype, setOf_mem_eq]
theorem isPathConnected_univ [PathConnectedSpace X] : IsPathConnected (univ : Set X) :=
pathConnectedSpace_iff_univ.mp inferInstance
theorem isPathConnected_range [PathConnectedSpace X] {f : X → Y} (hf : Continuous f) :
IsPathConnected (range f) := by
rw [← image_univ]
exact isPathConnected_univ.image hf
theorem Function.Surjective.pathConnectedSpace [PathConnectedSpace X]
{f : X → Y} (hf : Surjective f) (hf' : Continuous f) : PathConnectedSpace Y := by
rw [pathConnectedSpace_iff_univ, ← hf.range_eq]
exact isPathConnected_range hf'
instance Quotient.instPathConnectedSpace {s : Setoid X} [PathConnectedSpace X] :
PathConnectedSpace (Quotient s) :=
Quotient.mk'_surjective.pathConnectedSpace continuous_coinduced_rng
/-- This is a special case of `NormedSpace.instPathConnectedSpace` (and
`IsTopologicalAddGroup.pathConnectedSpace`). It exists only to simplify dependencies. -/
instance Real.instPathConnectedSpace : PathConnectedSpace ℝ where
joined x y := ⟨⟨⟨fun (t : I) ↦ (1 - t) * x + t * y, by fun_prop⟩, by simp, by simp⟩⟩
nonempty := inferInstance
theorem pathConnectedSpace_iff_eq : PathConnectedSpace X ↔ ∃ x : X, pathComponent x = univ := by
simp [pathConnectedSpace_iff_univ, isPathConnected_iff_eq]
-- see Note [lower instance priority]
instance (priority := 100) PathConnectedSpace.connectedSpace [PathConnectedSpace X] :
ConnectedSpace X := by
rw [connectedSpace_iff_connectedComponent]
rcases isPathConnected_iff_eq.mp (pathConnectedSpace_iff_univ.mp ‹_›) with ⟨x, _x_in, hx⟩
use x
rw [← univ_subset_iff]
exact (by simpa using hx : pathComponent x = univ) ▸ pathComponent_subset_component x
theorem IsPathConnected.isConnected (hF : IsPathConnected F) : IsConnected F := by
rw [isConnected_iff_connectedSpace]
rw [isPathConnected_iff_pathConnectedSpace] at hF
exact @PathConnectedSpace.connectedSpace _ _ hF
namespace PathConnectedSpace
variable [PathConnectedSpace X]
theorem exists_path_through_family {n : ℕ} (p : Fin (n + 1) → X) :
∃ γ : Path (p 0) (p n), ∀ i, p i ∈ range γ := by
have : IsPathConnected (univ : Set X) := pathConnectedSpace_iff_univ.mp (by infer_instance)
rcases this.exists_path_through_family p fun _i => True.intro with ⟨γ, -, h⟩
exact ⟨γ, h⟩
theorem exists_path_through_family' {n : ℕ} (p : Fin (n + 1) → X) :
∃ (γ : Path (p 0) (p n)) (t : Fin (n + 1) → I), ∀ i, γ (t i) = p i := by
have : IsPathConnected (univ : Set X) := pathConnectedSpace_iff_univ.mp (by infer_instance)
rcases this.exists_path_through_family' p fun _i => True.intro with ⟨γ, t, -, h⟩
exact ⟨γ, t, h⟩
end PathConnectedSpace
| Mathlib/Topology/Connected/PathConnected.lean | 851 | 853 | |
/-
Copyright (c) 2017 Robert Y. Lewis. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Robert Y. Lewis, Keeley Hoek
-/
import Mathlib.Algebra.NeZero
import Mathlib.Data.Int.DivMod
import Mathlib.Logic.Embedding.Basic
import Mathlib.Logic.Equiv.Set
import Mathlib.Tactic.Common
import Mathlib.Tactic.Attr.Register
/-!
# The finite type with `n` elements
`Fin n` is the type whose elements are natural numbers smaller than `n`.
This file expands on the development in the core library.
## Main definitions
### Induction principles
* `finZeroElim` : Elimination principle for the empty set `Fin 0`, generalizes `Fin.elim0`.
Further definitions and eliminators can be found in `Init.Data.Fin.Lemmas`
### Embeddings and isomorphisms
* `Fin.valEmbedding` : coercion to natural numbers as an `Embedding`;
* `Fin.succEmb` : `Fin.succ` as an `Embedding`;
* `Fin.castLEEmb h` : `Fin.castLE` as an `Embedding`, embed `Fin n` into `Fin m`, `h : n ≤ m`;
* `finCongr` : `Fin.cast` as an `Equiv`, equivalence between `Fin n` and `Fin m` when `n = m`;
* `Fin.castAddEmb m` : `Fin.castAdd` as an `Embedding`, embed `Fin n` into `Fin (n+m)`;
* `Fin.castSuccEmb` : `Fin.castSucc` as an `Embedding`, embed `Fin n` into `Fin (n+1)`;
* `Fin.addNatEmb m i` : `Fin.addNat` as an `Embedding`, add `m` on `i` on the right,
generalizes `Fin.succ`;
* `Fin.natAddEmb n i` : `Fin.natAdd` as an `Embedding`, adds `n` on `i` on the left;
### Other casts
* `Fin.divNat i` : divides `i : Fin (m * n)` by `n`;
* `Fin.modNat i` : takes the mod of `i : Fin (m * n)` by `n`;
-/
assert_not_exists Monoid Finset
open Fin Nat Function
attribute [simp] Fin.succ_ne_zero Fin.castSucc_lt_last
/-- Elimination principle for the empty set `Fin 0`, dependent version. -/
def finZeroElim {α : Fin 0 → Sort*} (x : Fin 0) : α x :=
x.elim0
namespace Fin
@[simp] theorem mk_eq_one {n a : Nat} {ha : a < n + 2} :
(⟨a, ha⟩ : Fin (n + 2)) = 1 ↔ a = 1 :=
mk.inj_iff
@[simp] theorem one_eq_mk {n a : Nat} {ha : a < n + 2} :
1 = (⟨a, ha⟩ : Fin (n + 2)) ↔ a = 1 := by
simp [eq_comm]
instance {n : ℕ} : CanLift ℕ (Fin n) Fin.val (· < n) where
prf k hk := ⟨⟨k, hk⟩, rfl⟩
/-- A dependent variant of `Fin.elim0`. -/
def rec0 {α : Fin 0 → Sort*} (i : Fin 0) : α i := absurd i.2 (Nat.not_lt_zero _)
variable {n m : ℕ}
--variable {a b : Fin n} -- this *really* breaks stuff
theorem val_injective : Function.Injective (@Fin.val n) :=
@Fin.eq_of_val_eq n
/-- If you actually have an element of `Fin n`, then the `n` is always positive -/
lemma size_positive : Fin n → 0 < n := Fin.pos
lemma size_positive' [Nonempty (Fin n)] : 0 < n :=
‹Nonempty (Fin n)›.elim Fin.pos
protected theorem prop (a : Fin n) : a.val < n :=
a.2
lemma lt_last_iff_ne_last {a : Fin (n + 1)} : a < last n ↔ a ≠ last n := by
simp [Fin.lt_iff_le_and_ne, le_last]
lemma ne_zero_of_lt {a b : Fin (n + 1)} (hab : a < b) : b ≠ 0 :=
Fin.ne_of_gt <| Fin.lt_of_le_of_lt a.zero_le hab
lemma ne_last_of_lt {a b : Fin (n + 1)} (hab : a < b) : a ≠ last n :=
Fin.ne_of_lt <| Fin.lt_of_lt_of_le hab b.le_last
/-- Equivalence between `Fin n` and `{ i // i < n }`. -/
@[simps apply symm_apply]
def equivSubtype : Fin n ≃ { i // i < n } where
toFun a := ⟨a.1, a.2⟩
invFun a := ⟨a.1, a.2⟩
left_inv := fun ⟨_, _⟩ => rfl
right_inv := fun ⟨_, _⟩ => rfl
section coe
/-!
### coercions and constructions
-/
theorem val_eq_val (a b : Fin n) : (a : ℕ) = b ↔ a = b :=
Fin.ext_iff.symm
theorem ne_iff_vne (a b : Fin n) : a ≠ b ↔ a.1 ≠ b.1 :=
Fin.ext_iff.not
theorem mk_eq_mk {a h a' h'} : @mk n a h = @mk n a' h' ↔ a = a' :=
Fin.ext_iff
-- syntactic tautologies now
/-- Assume `k = l`. If two functions defined on `Fin k` and `Fin l` are equal on each element,
then they coincide (in the heq sense). -/
protected theorem heq_fun_iff {α : Sort*} {k l : ℕ} (h : k = l) {f : Fin k → α} {g : Fin l → α} :
HEq f g ↔ ∀ i : Fin k, f i = g ⟨(i : ℕ), h ▸ i.2⟩ := by
subst h
simp [funext_iff]
/-- Assume `k = l` and `k' = l'`.
If two functions `Fin k → Fin k' → α` and `Fin l → Fin l' → α` are equal on each pair,
then they coincide (in the heq sense). -/
protected theorem heq_fun₂_iff {α : Sort*} {k l k' l' : ℕ} (h : k = l) (h' : k' = l')
{f : Fin k → Fin k' → α} {g : Fin l → Fin l' → α} :
HEq f g ↔ ∀ (i : Fin k) (j : Fin k'), f i j = g ⟨(i : ℕ), h ▸ i.2⟩ ⟨(j : ℕ), h' ▸ j.2⟩ := by
subst h
subst h'
simp [funext_iff]
/-- Two elements of `Fin k` and `Fin l` are heq iff their values in `ℕ` coincide. This requires
`k = l`. For the left implication without this assumption, see `val_eq_val_of_heq`. -/
protected theorem heq_ext_iff {k l : ℕ} (h : k = l) {i : Fin k} {j : Fin l} :
HEq i j ↔ (i : ℕ) = (j : ℕ) := by
subst h
simp [val_eq_val]
end coe
section Order
/-!
### order
-/
theorem le_iff_val_le_val {a b : Fin n} : a ≤ b ↔ (a : ℕ) ≤ b :=
Iff.rfl
/-- `a < b` as natural numbers if and only if `a < b` in `Fin n`. -/
@[norm_cast, simp]
theorem val_fin_lt {n : ℕ} {a b : Fin n} : (a : ℕ) < (b : ℕ) ↔ a < b :=
Iff.rfl
/-- `a ≤ b` as natural numbers if and only if `a ≤ b` in `Fin n`. -/
@[norm_cast, simp]
theorem val_fin_le {n : ℕ} {a b : Fin n} : (a : ℕ) ≤ (b : ℕ) ↔ a ≤ b :=
Iff.rfl
theorem min_val {a : Fin n} : min (a : ℕ) n = a := by simp
theorem max_val {a : Fin n} : max (a : ℕ) n = n := by simp
/-- The inclusion map `Fin n → ℕ` is an embedding. -/
@[simps -fullyApplied apply]
def valEmbedding : Fin n ↪ ℕ :=
⟨val, val_injective⟩
@[simp]
theorem equivSubtype_symm_trans_valEmbedding :
equivSubtype.symm.toEmbedding.trans valEmbedding = Embedding.subtype (· < n) :=
rfl
/-- Use the ordering on `Fin n` for checking recursive definitions.
For example, the following definition is not accepted by the termination checker,
unless we declare the `WellFoundedRelation` instance:
```lean
def factorial {n : ℕ} : Fin n → ℕ
| ⟨0, _⟩ := 1
| ⟨i + 1, hi⟩ := (i + 1) * factorial ⟨i, i.lt_succ_self.trans hi⟩
```
-/
instance {n : ℕ} : WellFoundedRelation (Fin n) :=
measure (val : Fin n → ℕ)
@[deprecated (since := "2025-02-24")]
alias val_zero' := val_zero
/-- `Fin.mk_zero` in `Lean` only applies in `Fin (n + 1)`.
This one instead uses a `NeZero n` typeclass hypothesis.
-/
@[simp]
theorem mk_zero' (n : ℕ) [NeZero n] : (⟨0, pos_of_neZero n⟩ : Fin n) = 0 := rfl
/--
The `Fin.zero_le` in `Lean` only applies in `Fin (n+1)`.
This one instead uses a `NeZero n` typeclass hypothesis.
-/
@[simp]
protected theorem zero_le' [NeZero n] (a : Fin n) : 0 ≤ a :=
Nat.zero_le a.val
@[simp, norm_cast]
theorem val_eq_zero_iff [NeZero n] {a : Fin n} : a.val = 0 ↔ a = 0 := by
rw [Fin.ext_iff, val_zero]
theorem val_ne_zero_iff [NeZero n] {a : Fin n} : a.val ≠ 0 ↔ a ≠ 0 :=
val_eq_zero_iff.not
@[simp, norm_cast]
theorem val_pos_iff [NeZero n] {a : Fin n} : 0 < a.val ↔ 0 < a := by
rw [← val_fin_lt, val_zero]
/--
The `Fin.pos_iff_ne_zero` in `Lean` only applies in `Fin (n+1)`.
This one instead uses a `NeZero n` typeclass hypothesis.
-/
theorem pos_iff_ne_zero' [NeZero n] (a : Fin n) : 0 < a ↔ a ≠ 0 := by
rw [← val_pos_iff, Nat.pos_iff_ne_zero, val_ne_zero_iff]
@[simp] lemma cast_eq_self (a : Fin n) : a.cast rfl = a := rfl
@[simp] theorem cast_eq_zero {k l : ℕ} [NeZero k] [NeZero l]
(h : k = l) (x : Fin k) : Fin.cast h x = 0 ↔ x = 0 := by
simp [← val_eq_zero_iff]
lemma cast_injective {k l : ℕ} (h : k = l) : Injective (Fin.cast h) :=
fun a b hab ↦ by simpa [← val_eq_val] using hab
theorem last_pos' [NeZero n] : 0 < last n := n.pos_of_neZero
theorem one_lt_last [NeZero n] : 1 < last (n + 1) := by
rw [lt_iff_val_lt_val, val_one, val_last, Nat.lt_add_left_iff_pos, Nat.pos_iff_ne_zero]
exact NeZero.ne n
end Order
/-! ### Coercions to `ℤ` and the `fin_omega` tactic. -/
open Int
theorem coe_int_sub_eq_ite {n : Nat} (u v : Fin n) :
((u - v : Fin n) : Int) = if v ≤ u then (u - v : Int) else (u - v : Int) + n := by
rw [Fin.sub_def]
split
· rw [natCast_emod, Int.emod_eq_sub_self_emod, Int.emod_eq_of_lt] <;> omega
· rw [natCast_emod, Int.emod_eq_of_lt] <;> omega
theorem coe_int_sub_eq_mod {n : Nat} (u v : Fin n) :
((u - v : Fin n) : Int) = ((u : Int) - (v : Int)) % n := by
rw [coe_int_sub_eq_ite]
split
· rw [Int.emod_eq_of_lt] <;> omega
· rw [Int.emod_eq_add_self_emod, Int.emod_eq_of_lt] <;> omega
theorem coe_int_add_eq_ite {n : Nat} (u v : Fin n) :
((u + v : Fin n) : Int) = if (u + v : ℕ) < n then (u + v : Int) else (u + v : Int) - n := by
rw [Fin.add_def]
split
· rw [natCast_emod, Int.emod_eq_of_lt] <;> omega
· rw [natCast_emod, Int.emod_eq_sub_self_emod, Int.emod_eq_of_lt] <;> omega
theorem coe_int_add_eq_mod {n : Nat} (u v : Fin n) :
((u + v : Fin n) : Int) = ((u : Int) + (v : Int)) % n := by
rw [coe_int_add_eq_ite]
split
· rw [Int.emod_eq_of_lt] <;> omega
· rw [Int.emod_eq_sub_self_emod, Int.emod_eq_of_lt] <;> omega
-- Write `a + b` as `if (a + b : ℕ) < n then (a + b : ℤ) else (a + b : ℤ) - n` and
-- similarly `a - b` as `if (b : ℕ) ≤ a then (a - b : ℤ) else (a - b : ℤ) + n`.
attribute [fin_omega] coe_int_sub_eq_ite coe_int_add_eq_ite
-- Rewrite inequalities in `Fin` to inequalities in `ℕ`
attribute [fin_omega] Fin.lt_iff_val_lt_val Fin.le_iff_val_le_val
-- Rewrite `1 : Fin (n + 2)` to `1 : ℤ`
attribute [fin_omega] val_one
/--
Preprocessor for `omega` to handle inequalities in `Fin`.
Note that this involves a lot of case splitting, so may be slow.
-/
-- Further adjustment to the simp set can probably make this more powerful.
-- Please experiment and PR updates!
macro "fin_omega" : tactic => `(tactic|
{ try simp only [fin_omega, ← Int.ofNat_lt, ← Int.ofNat_le] at *
omega })
section Add
/-!
### addition, numerals, and coercion from Nat
-/
@[simp]
theorem val_one' (n : ℕ) [NeZero n] : ((1 : Fin n) : ℕ) = 1 % n :=
rfl
@[deprecated val_one' (since := "2025-03-10")]
theorem val_one'' {n : ℕ} : ((1 : Fin (n + 1)) : ℕ) = 1 % (n + 1) :=
rfl
instance nontrivial {n : ℕ} : Nontrivial (Fin (n + 2)) where
exists_pair_ne := ⟨0, 1, (ne_iff_vne 0 1).mpr (by simp [val_one, val_zero])⟩
theorem nontrivial_iff_two_le : Nontrivial (Fin n) ↔ 2 ≤ n := by
rcases n with (_ | _ | n) <;>
simp [Fin.nontrivial, not_nontrivial, Nat.succ_le_iff]
section Monoid
instance inhabitedFinOneAdd (n : ℕ) : Inhabited (Fin (1 + n)) :=
haveI : NeZero (1 + n) := by rw [Nat.add_comm]; infer_instance
inferInstance
@[simp]
theorem default_eq_zero (n : ℕ) [NeZero n] : (default : Fin n) = 0 :=
rfl
instance instNatCast [NeZero n] : NatCast (Fin n) where
natCast i := Fin.ofNat' n i
lemma natCast_def [NeZero n] (a : ℕ) : (a : Fin n) = ⟨a % n, mod_lt _ n.pos_of_neZero⟩ := rfl
end Monoid
theorem val_add_eq_ite {n : ℕ} (a b : Fin n) :
(↑(a + b) : ℕ) = if n ≤ a + b then a + b - n else a + b := by
rw [Fin.val_add, Nat.add_mod_eq_ite, Nat.mod_eq_of_lt (show ↑a < n from a.2),
Nat.mod_eq_of_lt (show ↑b < n from b.2)]
theorem val_add_eq_of_add_lt {n : ℕ} {a b : Fin n} (huv : a.val + b.val < n) :
(a + b).val = a.val + b.val := by
rw [val_add]
simp [Nat.mod_eq_of_lt huv]
lemma intCast_val_sub_eq_sub_add_ite {n : ℕ} (a b : Fin n) :
((a - b).val : ℤ) = a.val - b.val + if b ≤ a then 0 else n := by
split <;> fin_omega
lemma one_le_of_ne_zero {n : ℕ} [NeZero n] {k : Fin n} (hk : k ≠ 0) : 1 ≤ k := by
obtain ⟨n, rfl⟩ := Nat.exists_eq_succ_of_ne_zero (NeZero.ne n)
cases n with
| zero => simp only [Nat.reduceAdd, Fin.isValue, Fin.zero_le]
| succ n => rwa [Fin.le_iff_val_le_val, Fin.val_one, Nat.one_le_iff_ne_zero, val_ne_zero_iff]
lemma val_sub_one_of_ne_zero [NeZero n] {i : Fin n} (hi : i ≠ 0) : (i - 1).val = i - 1 := by
obtain ⟨n, rfl⟩ := Nat.exists_eq_succ_of_ne_zero (NeZero.ne n)
rw [Fin.sub_val_of_le (one_le_of_ne_zero hi), Fin.val_one', Nat.mod_eq_of_lt
(Nat.succ_le_iff.mpr (nontrivial_iff_two_le.mp <| nontrivial_of_ne i 0 hi))]
section OfNatCoe
@[simp]
theorem ofNat'_eq_cast (n : ℕ) [NeZero n] (a : ℕ) : Fin.ofNat' n a = a :=
rfl
@[simp] lemma val_natCast (a n : ℕ) [NeZero n] : (a : Fin n).val = a % n := rfl
/-- Converting an in-range number to `Fin (n + 1)` produces a result
whose value is the original number. -/
theorem val_cast_of_lt {n : ℕ} [NeZero n] {a : ℕ} (h : a < n) : (a : Fin n).val = a :=
Nat.mod_eq_of_lt h
/-- If `n` is non-zero, converting the value of a `Fin n` to `Fin n` results
in the same value. -/
@[simp, norm_cast] theorem cast_val_eq_self {n : ℕ} [NeZero n] (a : Fin n) : (a.val : Fin n) = a :=
Fin.ext <| val_cast_of_lt a.isLt
-- This is a special case of `CharP.cast_eq_zero` that doesn't require typeclass search
@[simp high] lemma natCast_self (n : ℕ) [NeZero n] : (n : Fin n) = 0 := by ext; simp
@[simp] lemma natCast_eq_zero {a n : ℕ} [NeZero n] : (a : Fin n) = 0 ↔ n ∣ a := by
simp [Fin.ext_iff, Nat.dvd_iff_mod_eq_zero]
@[simp]
theorem natCast_eq_last (n) : (n : Fin (n + 1)) = Fin.last n := by ext; simp
theorem le_val_last (i : Fin (n + 1)) : i ≤ n := by
rw [Fin.natCast_eq_last]
exact Fin.le_last i
variable {a b : ℕ}
lemma natCast_le_natCast (han : a ≤ n) (hbn : b ≤ n) : (a : Fin (n + 1)) ≤ b ↔ a ≤ b := by
rw [← Nat.lt_succ_iff] at han hbn
simp [le_iff_val_le_val, -val_fin_le, Nat.mod_eq_of_lt, han, hbn]
lemma natCast_lt_natCast (han : a ≤ n) (hbn : b ≤ n) : (a : Fin (n + 1)) < b ↔ a < b := by
rw [← Nat.lt_succ_iff] at han hbn; simp [lt_iff_val_lt_val, Nat.mod_eq_of_lt, han, hbn]
lemma natCast_mono (hbn : b ≤ n) (hab : a ≤ b) : (a : Fin (n + 1)) ≤ b :=
(natCast_le_natCast (hab.trans hbn) hbn).2 hab
lemma natCast_strictMono (hbn : b ≤ n) (hab : a < b) : (a : Fin (n + 1)) < b :=
(natCast_lt_natCast (hab.le.trans hbn) hbn).2 hab
end OfNatCoe
end Add
section Succ
/-!
### succ and casts into larger Fin types
-/
lemma succ_injective (n : ℕ) : Injective (@Fin.succ n) := fun a b ↦ by simp [Fin.ext_iff]
/-- `Fin.succ` as an `Embedding` -/
def succEmb (n : ℕ) : Fin n ↪ Fin (n + 1) where
toFun := succ
inj' := succ_injective _
@[simp]
theorem coe_succEmb : ⇑(succEmb n) = Fin.succ :=
rfl
@[deprecated (since := "2025-04-12")]
alias val_succEmb := coe_succEmb
@[simp]
theorem exists_succ_eq {x : Fin (n + 1)} : (∃ y, Fin.succ y = x) ↔ x ≠ 0 :=
⟨fun ⟨_, hy⟩ => hy ▸ succ_ne_zero _, x.cases (fun h => h.irrefl.elim) (fun _ _ => ⟨_, rfl⟩)⟩
theorem exists_succ_eq_of_ne_zero {x : Fin (n + 1)} (h : x ≠ 0) :
∃ y, Fin.succ y = x := exists_succ_eq.mpr h
@[simp]
theorem succ_zero_eq_one' [NeZero n] : Fin.succ (0 : Fin n) = 1 := by
cases n
· exact (NeZero.ne 0 rfl).elim
· rfl
theorem one_pos' [NeZero n] : (0 : Fin (n + 1)) < 1 := succ_zero_eq_one' (n := n) ▸ succ_pos _
theorem zero_ne_one' [NeZero n] : (0 : Fin (n + 1)) ≠ 1 := Fin.ne_of_lt one_pos'
/--
The `Fin.succ_one_eq_two` in `Lean` only applies in `Fin (n+2)`.
This one instead uses a `NeZero n` typeclass hypothesis.
-/
@[simp]
theorem succ_one_eq_two' [NeZero n] : Fin.succ (1 : Fin (n + 1)) = 2 := by
cases n
· exact (NeZero.ne 0 rfl).elim
· rfl
-- Version of `succ_one_eq_two` to be used by `dsimp`.
-- Note the `'` swapped around due to a move to std4.
/--
The `Fin.le_zero_iff` in `Lean` only applies in `Fin (n+1)`.
This one instead uses a `NeZero n` typeclass hypothesis.
-/
@[simp]
theorem le_zero_iff' {n : ℕ} [NeZero n] {k : Fin n} : k ≤ 0 ↔ k = 0 :=
⟨fun h => Fin.ext <| by rw [Nat.eq_zero_of_le_zero h]; rfl, by rintro rfl; exact Nat.le_refl _⟩
-- TODO: Move to Batteries
@[simp] lemma castLE_inj {hmn : m ≤ n} {a b : Fin m} : castLE hmn a = castLE hmn b ↔ a = b := by
simp [Fin.ext_iff]
@[simp] lemma castAdd_inj {a b : Fin m} : castAdd n a = castAdd n b ↔ a = b := by simp [Fin.ext_iff]
attribute [simp] castSucc_inj
lemma castLE_injective (hmn : m ≤ n) : Injective (castLE hmn) :=
fun _ _ hab ↦ Fin.ext (congr_arg val hab :)
lemma castAdd_injective (m n : ℕ) : Injective (@Fin.castAdd m n) := castLE_injective _
lemma castSucc_injective (n : ℕ) : Injective (@Fin.castSucc n) := castAdd_injective _ _
/-- `Fin.castLE` as an `Embedding`, `castLEEmb h i` embeds `i` into a larger `Fin` type. -/
@[simps apply]
def castLEEmb (h : n ≤ m) : Fin n ↪ Fin m where
toFun := castLE h
inj' := castLE_injective _
@[simp, norm_cast] lemma coe_castLEEmb {m n} (hmn : m ≤ n) : castLEEmb hmn = castLE hmn := rfl
/- The next proof can be golfed a lot using `Fintype.card`.
It is written this way to define `ENat.card` and `Nat.card` without a `Fintype` dependency
(not done yet). -/
lemma nonempty_embedding_iff : Nonempty (Fin n ↪ Fin m) ↔ n ≤ m := by
refine ⟨fun h ↦ ?_, fun h ↦ ⟨castLEEmb h⟩⟩
induction n generalizing m with
| zero => exact m.zero_le
| succ n ihn =>
obtain ⟨e⟩ := h
rcases exists_eq_succ_of_ne_zero (pos_iff_nonempty.2 (Nonempty.map e inferInstance)).ne'
with ⟨m, rfl⟩
refine Nat.succ_le_succ <| ihn ⟨?_⟩
refine ⟨fun i ↦ (e.setValue 0 0 i.succ).pred (mt e.setValue_eq_iff.1 i.succ_ne_zero),
fun i j h ↦ ?_⟩
simpa only [pred_inj, EmbeddingLike.apply_eq_iff_eq, succ_inj] using h
lemma equiv_iff_eq : Nonempty (Fin m ≃ Fin n) ↔ m = n :=
⟨fun ⟨e⟩ ↦ le_antisymm (nonempty_embedding_iff.1 ⟨e⟩) (nonempty_embedding_iff.1 ⟨e.symm⟩),
fun h ↦ h ▸ ⟨.refl _⟩⟩
@[simp] lemma castLE_castSucc {n m} (i : Fin n) (h : n + 1 ≤ m) :
i.castSucc.castLE h = i.castLE (Nat.le_of_succ_le h) :=
rfl
@[simp] lemma castLE_comp_castSucc {n m} (h : n + 1 ≤ m) :
Fin.castLE h ∘ Fin.castSucc = Fin.castLE (Nat.le_of_succ_le h) :=
rfl
@[simp] lemma castLE_rfl (n : ℕ) : Fin.castLE (le_refl n) = id :=
rfl
@[simp]
theorem range_castLE {n k : ℕ} (h : n ≤ k) : Set.range (castLE h) = { i : Fin k | (i : ℕ) < n } :=
Set.ext fun x => ⟨fun ⟨y, hy⟩ => hy ▸ y.2, fun hx => ⟨⟨x, hx⟩, rfl⟩⟩
@[simp]
theorem coe_of_injective_castLE_symm {n k : ℕ} (h : n ≤ k) (i : Fin k) (hi) :
((Equiv.ofInjective _ (castLE_injective h)).symm ⟨i, hi⟩ : ℕ) = i := by
rw [← coe_castLE h]
exact congr_arg Fin.val (Equiv.apply_ofInjective_symm _ _)
theorem leftInverse_cast (eq : n = m) : LeftInverse (Fin.cast eq.symm) (Fin.cast eq) :=
fun _ => rfl
theorem rightInverse_cast (eq : n = m) : RightInverse (Fin.cast eq.symm) (Fin.cast eq) :=
fun _ => rfl
@[simp]
theorem cast_inj (eq : n = m) {a b : Fin n} : a.cast eq = b.cast eq ↔ a = b := by
simp [← val_inj]
@[simp]
theorem cast_lt_cast (eq : n = m) {a b : Fin n} : a.cast eq < b.cast eq ↔ a < b :=
Iff.rfl
@[simp]
theorem cast_le_cast (eq : n = m) {a b : Fin n} : a.cast eq ≤ b.cast eq ↔ a ≤ b :=
Iff.rfl
/-- The 'identity' equivalence between `Fin m` and `Fin n` when `m = n`. -/
@[simps]
def _root_.finCongr (eq : n = m) : Fin n ≃ Fin m where
toFun := Fin.cast eq
invFun := Fin.cast eq.symm
left_inv := leftInverse_cast eq
right_inv := rightInverse_cast eq
@[simp] lemma _root_.finCongr_apply_mk (h : m = n) (k : ℕ) (hk : k < m) :
finCongr h ⟨k, hk⟩ = ⟨k, h ▸ hk⟩ := rfl
@[simp]
lemma _root_.finCongr_refl (h : n = n := rfl) : finCongr h = Equiv.refl (Fin n) := by ext; simp
@[simp] lemma _root_.finCongr_symm (h : m = n) : (finCongr h).symm = finCongr h.symm := rfl
@[simp] lemma _root_.finCongr_apply_coe (h : m = n) (k : Fin m) : (finCongr h k : ℕ) = k := rfl
lemma _root_.finCongr_symm_apply_coe (h : m = n) (k : Fin n) : ((finCongr h).symm k : ℕ) = k := rfl
/-- While in many cases `finCongr` is better than `Equiv.cast`/`cast`, sometimes we want to apply
a generic theorem about `cast`. -/
lemma _root_.finCongr_eq_equivCast (h : n = m) : finCongr h = .cast (h ▸ rfl) := by subst h; simp
/-- While in many cases `Fin.cast` is better than `Equiv.cast`/`cast`, sometimes we want to apply
a generic theorem about `cast`. -/
theorem cast_eq_cast (h : n = m) : (Fin.cast h : Fin n → Fin m) = _root_.cast (h ▸ rfl) := by
subst h
ext
rfl
/-- `Fin.castAdd` as an `Embedding`, `castAddEmb m i` embeds `i : Fin n` in `Fin (n+m)`.
See also `Fin.natAddEmb` and `Fin.addNatEmb`. -/
def castAddEmb (m) : Fin n ↪ Fin (n + m) := castLEEmb (le_add_right n m)
@[simp]
lemma coe_castAddEmb (m) : (castAddEmb m : Fin n → Fin (n + m)) = castAdd m := rfl
lemma castAddEmb_apply (m) (i : Fin n) : castAddEmb m i = castAdd m i := rfl
/-- `Fin.castSucc` as an `Embedding`, `castSuccEmb i` embeds `i : Fin n` in `Fin (n+1)`. -/
def castSuccEmb : Fin n ↪ Fin (n + 1) := castAddEmb _
@[simp, norm_cast] lemma coe_castSuccEmb : (castSuccEmb : Fin n → Fin (n + 1)) = Fin.castSucc := rfl
lemma castSuccEmb_apply (i : Fin n) : castSuccEmb i = i.castSucc := rfl
theorem castSucc_le_succ {n} (i : Fin n) : i.castSucc ≤ i.succ := Nat.le_succ i
@[simp] theorem castSucc_le_castSucc_iff {a b : Fin n} : castSucc a ≤ castSucc b ↔ a ≤ b := .rfl
@[simp] theorem succ_le_castSucc_iff {a b : Fin n} : succ a ≤ castSucc b ↔ a < b := by
rw [le_castSucc_iff, succ_lt_succ_iff]
@[simp] theorem castSucc_lt_succ_iff {a b : Fin n} : castSucc a < succ b ↔ a ≤ b := by
rw [castSucc_lt_iff_succ_le, succ_le_succ_iff]
theorem le_of_castSucc_lt_of_succ_lt {a b : Fin (n + 1)} {i : Fin n}
(hl : castSucc i < a) (hu : b < succ i) : b < a := by
simp [Fin.lt_def, -val_fin_lt] at *; omega
theorem castSucc_lt_or_lt_succ (p : Fin (n + 1)) (i : Fin n) : castSucc i < p ∨ p < i.succ := by
simp [Fin.lt_def, -val_fin_lt]; omega
theorem succ_le_or_le_castSucc (p : Fin (n + 1)) (i : Fin n) : succ i ≤ p ∨ p ≤ i.castSucc := by
rw [le_castSucc_iff, ← castSucc_lt_iff_succ_le]
exact p.castSucc_lt_or_lt_succ i
theorem eq_castSucc_of_ne_last {x : Fin (n + 1)} (h : x ≠ (last _)) :
∃ y, Fin.castSucc y = x := exists_castSucc_eq.mpr h
@[deprecated (since := "2025-02-06")]
alias exists_castSucc_eq_of_ne_last := eq_castSucc_of_ne_last
theorem forall_fin_succ' {P : Fin (n + 1) → Prop} :
(∀ i, P i) ↔ (∀ i : Fin n, P i.castSucc) ∧ P (.last _) :=
⟨fun H => ⟨fun _ => H _, H _⟩, fun ⟨H0, H1⟩ i => Fin.lastCases H1 H0 i⟩
-- to match `Fin.eq_zero_or_eq_succ`
theorem eq_castSucc_or_eq_last {n : Nat} (i : Fin (n + 1)) :
(∃ j : Fin n, i = j.castSucc) ∨ i = last n := i.lastCases (Or.inr rfl) (Or.inl ⟨·, rfl⟩)
@[simp]
theorem castSucc_ne_last {n : ℕ} (i : Fin n) : i.castSucc ≠ .last n :=
Fin.ne_of_lt i.castSucc_lt_last
theorem exists_fin_succ' {P : Fin (n + 1) → Prop} :
(∃ i, P i) ↔ (∃ i : Fin n, P i.castSucc) ∨ P (.last _) :=
⟨fun ⟨i, h⟩ => Fin.lastCases Or.inr (fun i hi => Or.inl ⟨i, hi⟩) i h,
fun h => h.elim (fun ⟨i, hi⟩ => ⟨i.castSucc, hi⟩) (fun h => ⟨.last _, h⟩)⟩
/--
The `Fin.castSucc_zero` in `Lean` only applies in `Fin (n+1)`.
This one instead uses a `NeZero n` typeclass hypothesis.
-/
@[simp]
theorem castSucc_zero' [NeZero n] : castSucc (0 : Fin n) = 0 := rfl
@[simp]
theorem castSucc_pos_iff [NeZero n] {i : Fin n} : 0 < castSucc i ↔ 0 < i := by simp [← val_pos_iff]
/-- `castSucc i` is positive when `i` is positive.
The `Fin.castSucc_pos` in `Lean` only applies in `Fin (n+1)`.
This one instead uses a `NeZero n` typeclass hypothesis. -/
alias ⟨_, castSucc_pos'⟩ := castSucc_pos_iff
/--
The `Fin.castSucc_eq_zero_iff` in `Lean` only applies in `Fin (n+1)`.
This one instead uses a `NeZero n` typeclass hypothesis.
-/
@[simp]
theorem castSucc_eq_zero_iff' [NeZero n] (a : Fin n) : castSucc a = 0 ↔ a = 0 :=
Fin.ext_iff.trans <| (Fin.ext_iff.trans <| by simp).symm
/--
The `Fin.castSucc_ne_zero_iff` in `Lean` only applies in `Fin (n+1)`.
This one instead uses a `NeZero n` typeclass hypothesis.
-/
theorem castSucc_ne_zero_iff' [NeZero n] (a : Fin n) : castSucc a ≠ 0 ↔ a ≠ 0 :=
not_iff_not.mpr <| castSucc_eq_zero_iff' a
theorem castSucc_ne_zero_of_lt {p i : Fin n} (h : p < i) : castSucc i ≠ 0 := by
cases n
· exact i.elim0
· rw [castSucc_ne_zero_iff', Ne, Fin.ext_iff]
exact ((zero_le _).trans_lt h).ne'
theorem succ_ne_last_iff (a : Fin (n + 1)) : succ a ≠ last (n + 1) ↔ a ≠ last n :=
not_iff_not.mpr <| succ_eq_last_succ
theorem succ_ne_last_of_lt {p i : Fin n} (h : i < p) : succ i ≠ last n := by
cases n
· exact i.elim0
· rw [succ_ne_last_iff, Ne, Fin.ext_iff]
exact ((le_last _).trans_lt' h).ne
@[norm_cast, simp]
theorem coe_eq_castSucc {a : Fin n} : (a : Fin (n + 1)) = castSucc a := by
ext
exact val_cast_of_lt (Nat.lt.step a.is_lt)
theorem coe_succ_lt_iff_lt {n : ℕ} {j k : Fin n} : (j : Fin <| n + 1) < k ↔ j < k := by
simp only [coe_eq_castSucc, castSucc_lt_castSucc_iff]
@[simp]
theorem range_castSucc {n : ℕ} : Set.range (castSucc : Fin n → Fin n.succ) =
({ i | (i : ℕ) < n } : Set (Fin n.succ)) := range_castLE (by omega)
@[simp]
theorem coe_of_injective_castSucc_symm {n : ℕ} (i : Fin n.succ) (hi) :
((Equiv.ofInjective castSucc (castSucc_injective _)).symm ⟨i, hi⟩ : ℕ) = i := by
rw [← coe_castSucc]
exact congr_arg val (Equiv.apply_ofInjective_symm _ _)
/-- `Fin.addNat` as an `Embedding`, `addNatEmb m i` adds `m` to `i`, generalizes `Fin.succ`. -/
@[simps! apply]
def addNatEmb (m) : Fin n ↪ Fin (n + m) where
toFun := (addNat · m)
inj' a b := by simp [Fin.ext_iff]
/-- `Fin.natAdd` as an `Embedding`, `natAddEmb n i` adds `n` to `i` "on the left". -/
@[simps! apply]
def natAddEmb (n) {m} : Fin m ↪ Fin (n + m) where
toFun := natAdd n
inj' a b := by simp [Fin.ext_iff]
theorem castSucc_castAdd (i : Fin n) : castSucc (castAdd m i) = castAdd (m + 1) i := rfl
theorem castSucc_natAdd (i : Fin m) : castSucc (natAdd n i) = natAdd n (castSucc i) := rfl
theorem succ_castAdd (i : Fin n) : succ (castAdd m i) =
if h : i.succ = last _ then natAdd n (0 : Fin (m + 1))
else castAdd (m + 1) ⟨i.1 + 1, lt_of_le_of_ne i.2 (Fin.val_ne_iff.mpr h)⟩ := by
split_ifs with h
exacts [Fin.ext (congr_arg Fin.val h :), rfl]
theorem succ_natAdd (i : Fin m) : succ (natAdd n i) = natAdd n (succ i) := rfl
end Succ
section Pred
/-!
### pred
-/
theorem pred_one' [NeZero n] (h := (zero_ne_one' (n := n)).symm) :
Fin.pred (1 : Fin (n + 1)) h = 0 := by
simp_rw [Fin.ext_iff, coe_pred, val_one', val_zero, Nat.sub_eq_zero_iff_le, Nat.mod_le]
theorem pred_last (h := Fin.ext_iff.not.2 last_pos'.ne') :
pred (last (n + 1)) h = last n := by simp_rw [← succ_last, pred_succ]
theorem pred_lt_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ 0) : pred i hi < j ↔ i < succ j := by
rw [← succ_lt_succ_iff, succ_pred]
theorem lt_pred_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ 0) : j < pred i hi ↔ succ j < i := by
rw [← succ_lt_succ_iff, succ_pred]
theorem pred_le_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ 0) : pred i hi ≤ j ↔ i ≤ succ j := by
rw [← succ_le_succ_iff, succ_pred]
theorem le_pred_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ 0) : j ≤ pred i hi ↔ succ j ≤ i := by
rw [← succ_le_succ_iff, succ_pred]
theorem castSucc_pred_eq_pred_castSucc {a : Fin (n + 1)} (ha : a ≠ 0)
(ha' := castSucc_ne_zero_iff.mpr ha) :
(a.pred ha).castSucc = (castSucc a).pred ha' := rfl
theorem castSucc_pred_add_one_eq {a : Fin (n + 1)} (ha : a ≠ 0) :
(a.pred ha).castSucc + 1 = a := by
cases a using cases
· exact (ha rfl).elim
· rw [pred_succ, coeSucc_eq_succ]
theorem le_pred_castSucc_iff {a b : Fin (n + 1)} (ha : castSucc a ≠ 0) :
b ≤ (castSucc a).pred ha ↔ b < a := by
rw [le_pred_iff, succ_le_castSucc_iff]
theorem pred_castSucc_lt_iff {a b : Fin (n + 1)} (ha : castSucc a ≠ 0) :
(castSucc a).pred ha < b ↔ a ≤ b := by
rw [pred_lt_iff, castSucc_lt_succ_iff]
theorem pred_castSucc_lt {a : Fin (n + 1)} (ha : castSucc a ≠ 0) :
(castSucc a).pred ha < a := by rw [pred_castSucc_lt_iff, le_def]
theorem le_castSucc_pred_iff {a b : Fin (n + 1)} (ha : a ≠ 0) :
b ≤ castSucc (a.pred ha) ↔ b < a := by
rw [castSucc_pred_eq_pred_castSucc, le_pred_castSucc_iff]
theorem castSucc_pred_lt_iff {a b : Fin (n + 1)} (ha : a ≠ 0) :
castSucc (a.pred ha) < b ↔ a ≤ b := by
rw [castSucc_pred_eq_pred_castSucc, pred_castSucc_lt_iff]
theorem castSucc_pred_lt {a : Fin (n + 1)} (ha : a ≠ 0) :
castSucc (a.pred ha) < a := by rw [castSucc_pred_lt_iff, le_def]
end Pred
section CastPred
/-- `castPred i` sends `i : Fin (n + 1)` to `Fin n` as long as i ≠ last n. -/
@[inline] def castPred (i : Fin (n + 1)) (h : i ≠ last n) : Fin n := castLT i (val_lt_last h)
@[simp]
lemma castLT_eq_castPred (i : Fin (n + 1)) (h : i < last _) (h' := Fin.ext_iff.not.2 h.ne) :
castLT i h = castPred i h' := rfl
@[simp]
lemma coe_castPred (i : Fin (n + 1)) (h : i ≠ last _) : (castPred i h : ℕ) = i := rfl
@[simp]
theorem castPred_castSucc {i : Fin n} (h' := Fin.ext_iff.not.2 (castSucc_lt_last i).ne) :
castPred (castSucc i) h' = i := rfl
@[simp]
theorem castSucc_castPred (i : Fin (n + 1)) (h : i ≠ last n) :
castSucc (i.castPred h) = i := by
rcases exists_castSucc_eq.mpr h with ⟨y, rfl⟩
rw [castPred_castSucc]
theorem castPred_eq_iff_eq_castSucc (i : Fin (n + 1)) (hi : i ≠ last _) (j : Fin n) :
castPred i hi = j ↔ i = castSucc j :=
⟨fun h => by rw [← h, castSucc_castPred], fun h => by simp_rw [h, castPred_castSucc]⟩
@[simp]
theorem castPred_mk (i : ℕ) (h₁ : i < n) (h₂ := h₁.trans (Nat.lt_succ_self _))
(h₃ : ⟨i, h₂⟩ ≠ last _ := (ne_iff_vne _ _).mpr (val_last _ ▸ h₁.ne)) :
castPred ⟨i, h₂⟩ h₃ = ⟨i, h₁⟩ := rfl
@[simp]
theorem castPred_le_castPred_iff {i j : Fin (n + 1)} {hi : i ≠ last n} {hj : j ≠ last n} :
castPred i hi ≤ castPred j hj ↔ i ≤ j := Iff.rfl
/-- A version of the right-to-left implication of `castPred_le_castPred_iff`
that deduces `i ≠ last n` from `i ≤ j` and `j ≠ last n`. -/
@[gcongr]
theorem castPred_le_castPred {i j : Fin (n + 1)} (h : i ≤ j) (hj : j ≠ last n) :
castPred i (by rw [← lt_last_iff_ne_last] at hj ⊢; exact Fin.lt_of_le_of_lt h hj) ≤
castPred j hj :=
h
@[simp]
theorem castPred_lt_castPred_iff {i j : Fin (n + 1)} {hi : i ≠ last n} {hj : j ≠ last n} :
castPred i hi < castPred j hj ↔ i < j := Iff.rfl
/-- A version of the right-to-left implication of `castPred_lt_castPred_iff`
that deduces `i ≠ last n` from `i < j`. -/
@[gcongr]
theorem castPred_lt_castPred {i j : Fin (n + 1)} (h : i < j) (hj : j ≠ last n) :
castPred i (ne_last_of_lt h) < castPred j hj := h
theorem castPred_lt_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ last n) :
castPred i hi < j ↔ i < castSucc j := by
rw [← castSucc_lt_castSucc_iff, castSucc_castPred]
theorem lt_castPred_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ last n) :
j < castPred i hi ↔ castSucc j < i := by
rw [← castSucc_lt_castSucc_iff, castSucc_castPred]
theorem castPred_le_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ last n) :
castPred i hi ≤ j ↔ i ≤ castSucc j := by
rw [← castSucc_le_castSucc_iff, castSucc_castPred]
theorem le_castPred_iff {j : Fin n} {i : Fin (n + 1)} (hi : i ≠ last n) :
j ≤ castPred i hi ↔ castSucc j ≤ i := by
rw [← castSucc_le_castSucc_iff, castSucc_castPred]
@[simp]
theorem castPred_inj {i j : Fin (n + 1)} {hi : i ≠ last n} {hj : j ≠ last n} :
castPred i hi = castPred j hj ↔ i = j := by
simp_rw [Fin.ext_iff, le_antisymm_iff, ← le_def, castPred_le_castPred_iff]
theorem castPred_zero' [NeZero n] (h := Fin.ext_iff.not.2 last_pos'.ne) :
castPred (0 : Fin (n + 1)) h = 0 := rfl
theorem castPred_zero (h := Fin.ext_iff.not.2 last_pos.ne) :
castPred (0 : Fin (n + 2)) h = 0 := rfl
@[simp]
theorem castPred_eq_zero [NeZero n] {i : Fin (n + 1)} (h : i ≠ last n) :
Fin.castPred i h = 0 ↔ i = 0 := by
rw [← castPred_zero', castPred_inj]
@[simp]
theorem castPred_one [NeZero n] (h := Fin.ext_iff.not.2 one_lt_last.ne) :
castPred (1 : Fin (n + 2)) h = 1 := by
cases n
· exact subsingleton_one.elim _ 1
· rfl
theorem succ_castPred_eq_castPred_succ {a : Fin (n + 1)} (ha : a ≠ last n)
(ha' := a.succ_ne_last_iff.mpr ha) :
(a.castPred ha).succ = (succ a).castPred ha' := rfl
theorem succ_castPred_eq_add_one {a : Fin (n + 1)} (ha : a ≠ last n) :
(a.castPred ha).succ = a + 1 := by
cases a using lastCases
· exact (ha rfl).elim
· rw [castPred_castSucc, coeSucc_eq_succ]
theorem castpred_succ_le_iff {a b : Fin (n + 1)} (ha : succ a ≠ last (n + 1)) :
(succ a).castPred ha ≤ b ↔ a < b := by
rw [castPred_le_iff, succ_le_castSucc_iff]
theorem lt_castPred_succ_iff {a b : Fin (n + 1)} (ha : succ a ≠ last (n + 1)) :
b < (succ a).castPred ha ↔ b ≤ a := by
rw [lt_castPred_iff, castSucc_lt_succ_iff]
theorem lt_castPred_succ {a : Fin (n + 1)} (ha : succ a ≠ last (n + 1)) :
a < (succ a).castPred ha := by rw [lt_castPred_succ_iff, le_def]
theorem succ_castPred_le_iff {a b : Fin (n + 1)} (ha : a ≠ last n) :
succ (a.castPred ha) ≤ b ↔ a < b := by
rw [succ_castPred_eq_castPred_succ ha, castpred_succ_le_iff]
theorem lt_succ_castPred_iff {a b : Fin (n + 1)} (ha : a ≠ last n) :
b < succ (a.castPred ha) ↔ b ≤ a := by
rw [succ_castPred_eq_castPred_succ ha, lt_castPred_succ_iff]
theorem lt_succ_castPred {a : Fin (n + 1)} (ha : a ≠ last n) :
a < succ (a.castPred ha) := by rw [lt_succ_castPred_iff, le_def]
theorem castPred_le_pred_iff {a b : Fin (n + 1)} (ha : a ≠ last n) (hb : b ≠ 0) :
castPred a ha ≤ pred b hb ↔ a < b := by
rw [le_pred_iff, succ_castPred_le_iff]
theorem pred_lt_castPred_iff {a b : Fin (n + 1)} (ha : a ≠ 0) (hb : b ≠ last n) :
pred a ha < castPred b hb ↔ a ≤ b := by
rw [lt_castPred_iff, castSucc_pred_lt_iff ha]
theorem pred_lt_castPred {a : Fin (n + 1)} (h₁ : a ≠ 0) (h₂ : a ≠ last n) :
pred a h₁ < castPred a h₂ := by
rw [pred_lt_castPred_iff, le_def]
end CastPred
section SuccAbove
variable {p : Fin (n + 1)} {i j : Fin n}
/-- `succAbove p i` embeds `Fin n` into `Fin (n + 1)` with a hole around `p`. -/
def succAbove (p : Fin (n + 1)) (i : Fin n) : Fin (n + 1) :=
if castSucc i < p then i.castSucc else i.succ
/-- Embedding `i : Fin n` into `Fin (n + 1)` with a hole around `p : Fin (n + 1)`
embeds `i` by `castSucc` when the resulting `i.castSucc < p`. -/
lemma succAbove_of_castSucc_lt (p : Fin (n + 1)) (i : Fin n) (h : castSucc i < p) :
p.succAbove i = castSucc i := if_pos h
lemma succAbove_of_succ_le (p : Fin (n + 1)) (i : Fin n) (h : succ i ≤ p) :
p.succAbove i = castSucc i :=
succAbove_of_castSucc_lt _ _ (castSucc_lt_iff_succ_le.mpr h)
/-- Embedding `i : Fin n` into `Fin (n + 1)` with a hole around `p : Fin (n + 1)`
embeds `i` by `succ` when the resulting `p < i.succ`. -/
lemma succAbove_of_le_castSucc (p : Fin (n + 1)) (i : Fin n) (h : p ≤ castSucc i) :
p.succAbove i = i.succ := if_neg (Fin.not_lt.2 h)
lemma succAbove_of_lt_succ (p : Fin (n + 1)) (i : Fin n) (h : p < succ i) :
p.succAbove i = succ i := succAbove_of_le_castSucc _ _ (le_castSucc_iff.mpr h)
lemma succAbove_succ_of_lt (p i : Fin n) (h : p < i) : succAbove p.succ i = i.succ :=
succAbove_of_lt_succ _ _ (succ_lt_succ_iff.mpr h)
lemma succAbove_succ_of_le (p i : Fin n) (h : i ≤ p) : succAbove p.succ i = i.castSucc :=
succAbove_of_succ_le _ _ (succ_le_succ_iff.mpr h)
@[simp] lemma succAbove_succ_self (j : Fin n) : j.succ.succAbove j = j.castSucc :=
succAbove_succ_of_le _ _ Fin.le_rfl
lemma succAbove_castSucc_of_lt (p i : Fin n) (h : i < p) : succAbove p.castSucc i = i.castSucc :=
succAbove_of_castSucc_lt _ _ (castSucc_lt_castSucc_iff.2 h)
lemma succAbove_castSucc_of_le (p i : Fin n) (h : p ≤ i) : succAbove p.castSucc i = i.succ :=
succAbove_of_le_castSucc _ _ (castSucc_le_castSucc_iff.2 h)
@[simp] lemma succAbove_castSucc_self (j : Fin n) : succAbove j.castSucc j = j.succ :=
succAbove_castSucc_of_le _ _ Fin.le_rfl
lemma succAbove_pred_of_lt (p i : Fin (n + 1)) (h : p < i)
(hi := Fin.ne_of_gt <| Fin.lt_of_le_of_lt p.zero_le h) : succAbove p (i.pred hi) = i := by
rw [succAbove_of_lt_succ _ _ (succ_pred _ _ ▸ h), succ_pred]
lemma succAbove_pred_of_le (p i : Fin (n + 1)) (h : i ≤ p) (hi : i ≠ 0) :
succAbove p (i.pred hi) = (i.pred hi).castSucc := succAbove_of_succ_le _ _ (succ_pred _ _ ▸ h)
@[simp] lemma succAbove_pred_self (p : Fin (n + 1)) (h : p ≠ 0) :
succAbove p (p.pred h) = (p.pred h).castSucc := succAbove_pred_of_le _ _ Fin.le_rfl h
lemma succAbove_castPred_of_lt (p i : Fin (n + 1)) (h : i < p)
(hi := Fin.ne_of_lt <| Nat.lt_of_lt_of_le h p.le_last) : succAbove p (i.castPred hi) = i := by
rw [succAbove_of_castSucc_lt _ _ (castSucc_castPred _ _ ▸ h), castSucc_castPred]
lemma succAbove_castPred_of_le (p i : Fin (n + 1)) (h : p ≤ i) (hi : i ≠ last n) :
succAbove p (i.castPred hi) = (i.castPred hi).succ :=
succAbove_of_le_castSucc _ _ (castSucc_castPred _ _ ▸ h)
lemma succAbove_castPred_self (p : Fin (n + 1)) (h : p ≠ last n) :
succAbove p (p.castPred h) = (p.castPred h).succ := succAbove_castPred_of_le _ _ Fin.le_rfl h
/-- Embedding `i : Fin n` into `Fin (n + 1)` with a hole around `p : Fin (n + 1)`
never results in `p` itself -/
@[simp]
lemma succAbove_ne (p : Fin (n + 1)) (i : Fin n) : p.succAbove i ≠ p := by
rcases p.castSucc_lt_or_lt_succ i with (h | h)
· rw [succAbove_of_castSucc_lt _ _ h]
exact Fin.ne_of_lt h
· rw [succAbove_of_lt_succ _ _ h]
exact Fin.ne_of_gt h
@[simp]
lemma ne_succAbove (p : Fin (n + 1)) (i : Fin n) : p ≠ p.succAbove i := (succAbove_ne _ _).symm
/-- Given a fixed pivot `p : Fin (n + 1)`, `p.succAbove` is injective. -/
lemma succAbove_right_injective : Injective p.succAbove := by
rintro i j hij
unfold succAbove at hij
split_ifs at hij with hi hj hj
· exact castSucc_injective _ hij
· rw [hij] at hi
cases hj <| Nat.lt_trans j.castSucc_lt_succ hi
· rw [← hij] at hj
cases hi <| Nat.lt_trans i.castSucc_lt_succ hj
· exact succ_injective _ hij
/-- Given a fixed pivot `p : Fin (n + 1)`, `p.succAbove` is injective. -/
lemma succAbove_right_inj : p.succAbove i = p.succAbove j ↔ i = j :=
succAbove_right_injective.eq_iff
/-- `Fin.succAbove p` as an `Embedding`. -/
@[simps!]
def succAboveEmb (p : Fin (n + 1)) : Fin n ↪ Fin (n + 1) := ⟨p.succAbove, succAbove_right_injective⟩
@[simp, norm_cast] lemma coe_succAboveEmb (p : Fin (n + 1)) : p.succAboveEmb = p.succAbove := rfl
@[simp]
lemma succAbove_ne_zero_zero [NeZero n] {a : Fin (n + 1)} (ha : a ≠ 0) : a.succAbove 0 = 0 := by
rw [Fin.succAbove_of_castSucc_lt]
· exact castSucc_zero'
· exact Fin.pos_iff_ne_zero.2 ha
lemma succAbove_eq_zero_iff [NeZero n] {a : Fin (n + 1)} {b : Fin n} (ha : a ≠ 0) :
a.succAbove b = 0 ↔ b = 0 := by
rw [← succAbove_ne_zero_zero ha, succAbove_right_inj]
lemma succAbove_ne_zero [NeZero n] {a : Fin (n + 1)} {b : Fin n} (ha : a ≠ 0) (hb : b ≠ 0) :
a.succAbove b ≠ 0 := mt (succAbove_eq_zero_iff ha).mp hb
/-- Embedding `Fin n` into `Fin (n + 1)` with a hole around zero embeds by `succ`. -/
@[simp] lemma succAbove_zero : succAbove (0 : Fin (n + 1)) = Fin.succ := rfl
lemma succAbove_zero_apply (i : Fin n) : succAbove 0 i = succ i := by rw [succAbove_zero]
@[simp] lemma succAbove_ne_last_last {a : Fin (n + 2)} (h : a ≠ last (n + 1)) :
a.succAbove (last n) = last (n + 1) := by
rw [succAbove_of_lt_succ _ _ (succ_last _ ▸ lt_last_iff_ne_last.2 h), succ_last]
lemma succAbove_eq_last_iff {a : Fin (n + 2)} {b : Fin (n + 1)} (ha : a ≠ last _) :
a.succAbove b = last _ ↔ b = last _ := by
rw [← succAbove_ne_last_last ha, succAbove_right_inj]
lemma succAbove_ne_last {a : Fin (n + 2)} {b : Fin (n + 1)} (ha : a ≠ last _) (hb : b ≠ last _) :
a.succAbove b ≠ last _ := mt (succAbove_eq_last_iff ha).mp hb
/-- Embedding `Fin n` into `Fin (n + 1)` with a hole around `last n` embeds by `castSucc`. -/
@[simp] lemma succAbove_last : succAbove (last n) = castSucc := by
ext; simp only [succAbove_of_castSucc_lt, castSucc_lt_last]
lemma succAbove_last_apply (i : Fin n) : succAbove (last n) i = castSucc i := by rw [succAbove_last]
/-- Embedding `i : Fin n` into `Fin (n + 1)` using a pivot `p` that is greater
results in a value that is less than `p`. -/
lemma succAbove_lt_iff_castSucc_lt (p : Fin (n + 1)) (i : Fin n) :
p.succAbove i < p ↔ castSucc i < p := by
rcases castSucc_lt_or_lt_succ p i with H | H
· rwa [iff_true_right H, succAbove_of_castSucc_lt _ _ H]
· rw [castSucc_lt_iff_succ_le, iff_false_right (Fin.not_le.2 H), succAbove_of_lt_succ _ _ H]
exact Fin.not_lt.2 <| Fin.le_of_lt H
lemma succAbove_lt_iff_succ_le (p : Fin (n + 1)) (i : Fin n) :
p.succAbove i < p ↔ succ i ≤ p := by
rw [succAbove_lt_iff_castSucc_lt, castSucc_lt_iff_succ_le]
/-- Embedding `i : Fin n` into `Fin (n + 1)` using a pivot `p` that is lesser
results in a value that is greater than `p`. -/
lemma lt_succAbove_iff_le_castSucc (p : Fin (n + 1)) (i : Fin n) :
p < p.succAbove i ↔ p ≤ castSucc i := by
rcases castSucc_lt_or_lt_succ p i with H | H
· rw [iff_false_right (Fin.not_le.2 H), succAbove_of_castSucc_lt _ _ H]
exact Fin.not_lt.2 <| Fin.le_of_lt H
· rwa [succAbove_of_lt_succ _ _ H, iff_true_left H, le_castSucc_iff]
lemma lt_succAbove_iff_lt_castSucc (p : Fin (n + 1)) (i : Fin n) :
p < p.succAbove i ↔ p < succ i := by rw [lt_succAbove_iff_le_castSucc, le_castSucc_iff]
/-- Embedding a positive `Fin n` results in a positive `Fin (n + 1)` -/
lemma succAbove_pos [NeZero n] (p : Fin (n + 1)) (i : Fin n) (h : 0 < i) : 0 < p.succAbove i := by
by_cases H : castSucc i < p
· simpa [succAbove_of_castSucc_lt _ _ H] using castSucc_pos' h
· simp [succAbove_of_le_castSucc _ _ (Fin.not_lt.1 H)]
lemma castPred_succAbove (x : Fin n) (y : Fin (n + 1)) (h : castSucc x < y)
(h' := Fin.ne_last_of_lt <| (succAbove_lt_iff_castSucc_lt ..).2 h) :
(y.succAbove x).castPred h' = x := by
rw [castPred_eq_iff_eq_castSucc, succAbove_of_castSucc_lt _ _ h]
lemma pred_succAbove (x : Fin n) (y : Fin (n + 1)) (h : y ≤ castSucc x)
(h' := Fin.ne_zero_of_lt <| (lt_succAbove_iff_le_castSucc ..).2 h) :
(y.succAbove x).pred h' = x := by simp only [succAbove_of_le_castSucc _ _ h, pred_succ]
lemma exists_succAbove_eq {x y : Fin (n + 1)} (h : x ≠ y) : ∃ z, y.succAbove z = x := by
obtain hxy | hyx := Fin.lt_or_lt_of_ne h
exacts [⟨_, succAbove_castPred_of_lt _ _ hxy⟩, ⟨_, succAbove_pred_of_lt _ _ hyx⟩]
@[simp] lemma exists_succAbove_eq_iff {x y : Fin (n + 1)} : (∃ z, x.succAbove z = y) ↔ y ≠ x :=
⟨by rintro ⟨y, rfl⟩; exact succAbove_ne _ _, exists_succAbove_eq⟩
/-- The range of `p.succAbove` is everything except `p`. -/
@[simp] lemma range_succAbove (p : Fin (n + 1)) : Set.range p.succAbove = {p}ᶜ :=
Set.ext fun _ => exists_succAbove_eq_iff
@[simp] lemma range_succ (n : ℕ) : Set.range (Fin.succ : Fin n → Fin (n + 1)) = {0}ᶜ := by
rw [← succAbove_zero]; exact range_succAbove (0 : Fin (n + 1))
/-- `succAbove` is injective at the pivot -/
lemma succAbove_left_injective : Injective (@succAbove n) := fun _ _ h => by
simpa [range_succAbove] using congr_arg (fun f : Fin n → Fin (n + 1) => (Set.range f)ᶜ) h
|
/-- `succAbove` is injective at the pivot -/
| Mathlib/Data/Fin/Basic.lean | 1,115 | 1,116 |
/-
Copyright (c) 2019 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes, Yaël Dillies
-/
import Mathlib.Algebra.Module.BigOperators
import Mathlib.GroupTheory.Perm.Basic
import Mathlib.GroupTheory.Perm.Finite
import Mathlib.GroupTheory.Perm.List
import Mathlib.GroupTheory.Perm.Sign
/-!
# Cycles of a permutation
This file starts the theory of cycles in permutations.
## Main definitions
In the following, `f : Equiv.Perm β`.
* `Equiv.Perm.SameCycle`: `f.SameCycle x y` when `x` and `y` are in the same cycle of `f`.
* `Equiv.Perm.IsCycle`: `f` is a cycle if any two nonfixed points of `f` are related by repeated
applications of `f`, and `f` is not the identity.
* `Equiv.Perm.IsCycleOn`: `f` is a cycle on a set `s` when any two points of `s` are related by
repeated applications of `f`.
## Notes
`Equiv.Perm.IsCycle` and `Equiv.Perm.IsCycleOn` are different in three ways:
* `IsCycle` is about the entire type while `IsCycleOn` is restricted to a set.
* `IsCycle` forbids the identity while `IsCycleOn` allows it (if `s` is a subsingleton).
* `IsCycleOn` forbids fixed points on `s` (if `s` is nontrivial), while `IsCycle` allows them.
-/
open Equiv Function Finset
variable {ι α β : Type*}
namespace Equiv.Perm
/-! ### `SameCycle` -/
section SameCycle
variable {f g : Perm α} {p : α → Prop} {x y z : α}
/-- The equivalence relation indicating that two points are in the same cycle of a permutation. -/
def SameCycle (f : Perm α) (x y : α) : Prop :=
∃ i : ℤ, (f ^ i) x = y
@[refl]
theorem SameCycle.refl (f : Perm α) (x : α) : SameCycle f x x :=
⟨0, rfl⟩
theorem SameCycle.rfl : SameCycle f x x :=
SameCycle.refl _ _
protected theorem _root_.Eq.sameCycle (h : x = y) (f : Perm α) : f.SameCycle x y := by rw [h]
@[symm]
theorem SameCycle.symm : SameCycle f x y → SameCycle f y x := fun ⟨i, hi⟩ =>
⟨-i, by rw [zpow_neg, ← hi, inv_apply_self]⟩
theorem sameCycle_comm : SameCycle f x y ↔ SameCycle f y x :=
⟨SameCycle.symm, SameCycle.symm⟩
@[trans]
theorem SameCycle.trans : SameCycle f x y → SameCycle f y z → SameCycle f x z :=
fun ⟨i, hi⟩ ⟨j, hj⟩ => ⟨j + i, by rw [zpow_add, mul_apply, hi, hj]⟩
variable (f) in
theorem SameCycle.equivalence : Equivalence (SameCycle f) :=
⟨SameCycle.refl f, SameCycle.symm, SameCycle.trans⟩
/-- The setoid defined by the `SameCycle` relation. -/
def SameCycle.setoid (f : Perm α) : Setoid α where
r := f.SameCycle
iseqv := SameCycle.equivalence f
@[simp]
theorem sameCycle_one : SameCycle 1 x y ↔ x = y := by simp [SameCycle]
@[simp]
theorem sameCycle_inv : SameCycle f⁻¹ x y ↔ SameCycle f x y :=
(Equiv.neg _).exists_congr_left.trans <| by simp [SameCycle]
alias ⟨SameCycle.of_inv, SameCycle.inv⟩ := sameCycle_inv
@[simp]
theorem sameCycle_conj : SameCycle (g * f * g⁻¹) x y ↔ SameCycle f (g⁻¹ x) (g⁻¹ y) :=
exists_congr fun i => by simp [conj_zpow, eq_inv_iff_eq]
theorem SameCycle.conj : SameCycle f x y → SameCycle (g * f * g⁻¹) (g x) (g y) := by
simp [sameCycle_conj]
theorem SameCycle.apply_eq_self_iff : SameCycle f x y → (f x = x ↔ f y = y) := fun ⟨i, hi⟩ => by
rw [← hi, ← mul_apply, ← zpow_one_add, add_comm, zpow_add_one, mul_apply,
(f ^ i).injective.eq_iff]
theorem SameCycle.eq_of_left (h : SameCycle f x y) (hx : IsFixedPt f x) : x = y :=
let ⟨_, hn⟩ := h
(hx.perm_zpow _).eq.symm.trans hn
theorem SameCycle.eq_of_right (h : SameCycle f x y) (hy : IsFixedPt f y) : x = y :=
h.eq_of_left <| h.apply_eq_self_iff.2 hy
@[simp]
theorem sameCycle_apply_left : SameCycle f (f x) y ↔ SameCycle f x y :=
(Equiv.addRight 1).exists_congr_left.trans <| by
simp [zpow_sub, SameCycle, Int.add_neg_one, Function.comp]
@[simp]
theorem sameCycle_apply_right : SameCycle f x (f y) ↔ SameCycle f x y := by
rw [sameCycle_comm, sameCycle_apply_left, sameCycle_comm]
@[simp]
theorem sameCycle_inv_apply_left : SameCycle f (f⁻¹ x) y ↔ SameCycle f x y := by
rw [← sameCycle_apply_left, apply_inv_self]
@[simp]
theorem sameCycle_inv_apply_right : SameCycle f x (f⁻¹ y) ↔ SameCycle f x y := by
rw [← sameCycle_apply_right, apply_inv_self]
@[simp]
theorem sameCycle_zpow_left {n : ℤ} : SameCycle f ((f ^ n) x) y ↔ SameCycle f x y :=
(Equiv.addRight (n : ℤ)).exists_congr_left.trans <| by simp [SameCycle, zpow_add]
@[simp]
theorem sameCycle_zpow_right {n : ℤ} : SameCycle f x ((f ^ n) y) ↔ SameCycle f x y := by
rw [sameCycle_comm, sameCycle_zpow_left, sameCycle_comm]
@[simp]
theorem sameCycle_pow_left {n : ℕ} : SameCycle f ((f ^ n) x) y ↔ SameCycle f x y := by
rw [← zpow_natCast, sameCycle_zpow_left]
@[simp]
theorem sameCycle_pow_right {n : ℕ} : SameCycle f x ((f ^ n) y) ↔ SameCycle f x y := by
rw [← zpow_natCast, sameCycle_zpow_right]
alias ⟨SameCycle.of_apply_left, SameCycle.apply_left⟩ := sameCycle_apply_left
alias ⟨SameCycle.of_apply_right, SameCycle.apply_right⟩ := sameCycle_apply_right
alias ⟨SameCycle.of_inv_apply_left, SameCycle.inv_apply_left⟩ := sameCycle_inv_apply_left
alias ⟨SameCycle.of_inv_apply_right, SameCycle.inv_apply_right⟩ := sameCycle_inv_apply_right
alias ⟨SameCycle.of_pow_left, SameCycle.pow_left⟩ := sameCycle_pow_left
alias ⟨SameCycle.of_pow_right, SameCycle.pow_right⟩ := sameCycle_pow_right
alias ⟨SameCycle.of_zpow_left, SameCycle.zpow_left⟩ := sameCycle_zpow_left
alias ⟨SameCycle.of_zpow_right, SameCycle.zpow_right⟩ := sameCycle_zpow_right
theorem SameCycle.of_pow {n : ℕ} : SameCycle (f ^ n) x y → SameCycle f x y := fun ⟨m, h⟩ =>
⟨n * m, by simp [zpow_mul, h]⟩
theorem SameCycle.of_zpow {n : ℤ} : SameCycle (f ^ n) x y → SameCycle f x y := fun ⟨m, h⟩ =>
⟨n * m, by simp [zpow_mul, h]⟩
@[simp]
theorem sameCycle_subtypePerm {h} {x y : { x // p x }} :
(f.subtypePerm h).SameCycle x y ↔ f.SameCycle x y :=
exists_congr fun n => by simp [Subtype.ext_iff]
alias ⟨_, SameCycle.subtypePerm⟩ := sameCycle_subtypePerm
@[simp]
theorem sameCycle_extendDomain {p : β → Prop} [DecidablePred p] {f : α ≃ Subtype p} :
SameCycle (g.extendDomain f) (f x) (f y) ↔ g.SameCycle x y :=
exists_congr fun n => by
rw [← extendDomain_zpow, extendDomain_apply_image, Subtype.coe_inj, f.injective.eq_iff]
alias ⟨_, SameCycle.extendDomain⟩ := sameCycle_extendDomain
theorem SameCycle.exists_pow_eq' [Finite α] : SameCycle f x y → ∃ i < orderOf f, (f ^ i) x = y := by
rintro ⟨k, rfl⟩
use (k % orderOf f).natAbs
have h₀ := Int.natCast_pos.mpr (orderOf_pos f)
have h₁ := Int.emod_nonneg k h₀.ne'
rw [← zpow_natCast, Int.natAbs_of_nonneg h₁, zpow_mod_orderOf]
refine ⟨?_, by rfl⟩
rw [← Int.ofNat_lt, Int.natAbs_of_nonneg h₁]
exact Int.emod_lt_of_pos _ h₀
theorem SameCycle.exists_pow_eq'' [Finite α] (h : SameCycle f x y) :
∃ i : ℕ, 0 < i ∧ i ≤ orderOf f ∧ (f ^ i) x = y := by
obtain ⟨_ | i, hi, rfl⟩ := h.exists_pow_eq'
· refine ⟨orderOf f, orderOf_pos f, le_rfl, ?_⟩
rw [pow_orderOf_eq_one, pow_zero]
· exact ⟨i.succ, i.zero_lt_succ, hi.le, by rfl⟩
theorem SameCycle.exists_fin_pow_eq [Finite α] (h : SameCycle f x y) :
∃ i : Fin (orderOf f), (f ^ (i : ℕ)) x = y := by
obtain ⟨i, hi, hx⟩ := SameCycle.exists_pow_eq' h
exact ⟨⟨i, hi⟩, hx⟩
theorem SameCycle.exists_nat_pow_eq [Finite α] (h : SameCycle f x y) :
∃ i : ℕ, (f ^ i) x = y := by
obtain ⟨i, _, hi⟩ := h.exists_pow_eq'
exact ⟨i, hi⟩
instance (f : Perm α) [DecidableRel (SameCycle f)] :
DecidableRel (SameCycle f⁻¹) := fun x y =>
decidable_of_iff (f.SameCycle x y) (sameCycle_inv).symm
instance (priority := 100) [DecidableEq α] : DecidableRel (SameCycle (1 : Perm α)) := fun x y =>
decidable_of_iff (x = y) sameCycle_one.symm
end SameCycle
/-!
### `IsCycle`
-/
section IsCycle
variable {f g : Perm α} {x y : α}
/-- A cycle is a non identity permutation where any two nonfixed points of the permutation are
related by repeated application of the permutation. -/
def IsCycle (f : Perm α) : Prop :=
∃ x, f x ≠ x ∧ ∀ ⦃y⦄, f y ≠ y → SameCycle f x y
theorem IsCycle.ne_one (h : IsCycle f) : f ≠ 1 := fun hf => by simp [hf, IsCycle] at h
@[simp]
theorem not_isCycle_one : ¬(1 : Perm α).IsCycle := fun H => H.ne_one rfl
protected theorem IsCycle.sameCycle (hf : IsCycle f) (hx : f x ≠ x) (hy : f y ≠ y) :
SameCycle f x y :=
let ⟨g, hg⟩ := hf
let ⟨a, ha⟩ := hg.2 hx
let ⟨b, hb⟩ := hg.2 hy
⟨b - a, by rw [← ha, ← mul_apply, ← zpow_add, sub_add_cancel, hb]⟩
theorem IsCycle.exists_zpow_eq : IsCycle f → f x ≠ x → f y ≠ y → ∃ i : ℤ, (f ^ i) x = y :=
IsCycle.sameCycle
theorem IsCycle.inv (hf : IsCycle f) : IsCycle f⁻¹ :=
hf.imp fun _ ⟨hx, h⟩ =>
⟨inv_eq_iff_eq.not.2 hx.symm, fun _ hy => (h <| inv_eq_iff_eq.not.2 hy.symm).inv⟩
@[simp]
theorem isCycle_inv : IsCycle f⁻¹ ↔ IsCycle f :=
⟨fun h => h.inv, IsCycle.inv⟩
theorem IsCycle.conj : IsCycle f → IsCycle (g * f * g⁻¹) := by
rintro ⟨x, hx, h⟩
refine ⟨g x, by simp [coe_mul, inv_apply_self, hx], fun y hy => ?_⟩
rw [← apply_inv_self g y]
exact (h <| eq_inv_iff_eq.not.2 hy).conj
protected theorem IsCycle.extendDomain {p : β → Prop} [DecidablePred p] (f : α ≃ Subtype p) :
IsCycle g → IsCycle (g.extendDomain f) := by
rintro ⟨a, ha, ha'⟩
refine ⟨f a, ?_, fun b hb => ?_⟩
· rw [extendDomain_apply_image]
exact Subtype.coe_injective.ne (f.injective.ne ha)
have h : b = f (f.symm ⟨b, of_not_not <| hb ∘ extendDomain_apply_not_subtype _ _⟩) := by
rw [apply_symm_apply, Subtype.coe_mk]
rw [h] at hb ⊢
simp only [extendDomain_apply_image, Subtype.coe_injective.ne_iff, f.injective.ne_iff] at hb
exact (ha' hb).extendDomain
theorem isCycle_iff_sameCycle (hx : f x ≠ x) : IsCycle f ↔ ∀ {y}, SameCycle f x y ↔ f y ≠ y :=
⟨fun hf y =>
⟨fun ⟨i, hi⟩ hy =>
hx <| by
rw [← zpow_apply_eq_self_of_apply_eq_self hy i, (f ^ i).injective.eq_iff] at hi
rw [hi, hy],
hf.exists_zpow_eq hx⟩,
fun h => ⟨x, hx, fun _ hy => h.2 hy⟩⟩
section Finite
variable [Finite α]
theorem IsCycle.exists_pow_eq (hf : IsCycle f) (hx : f x ≠ x) (hy : f y ≠ y) :
∃ i : ℕ, (f ^ i) x = y := by
let ⟨n, hn⟩ := hf.exists_zpow_eq hx hy
classical exact
⟨(n % orderOf f).toNat, by
{have := n.emod_nonneg (Int.natCast_ne_zero.mpr (ne_of_gt (orderOf_pos f)))
rwa [← zpow_natCast, Int.toNat_of_nonneg this, zpow_mod_orderOf]}⟩
end Finite
variable [DecidableEq α]
theorem isCycle_swap (hxy : x ≠ y) : IsCycle (swap x y) :=
⟨y, by rwa [swap_apply_right], fun a (ha : ite (a = x) y (ite (a = y) x a) ≠ a) =>
if hya : y = a then ⟨0, hya⟩
else
⟨1, by
rw [zpow_one, swap_apply_def]
split_ifs at * <;> tauto⟩⟩
protected theorem IsSwap.isCycle : IsSwap f → IsCycle f := by
rintro ⟨x, y, hxy, rfl⟩
exact isCycle_swap hxy
variable [Fintype α]
theorem IsCycle.two_le_card_support (h : IsCycle f) : 2 ≤ #f.support :=
two_le_card_support_of_ne_one h.ne_one
/-- The subgroup generated by a cycle is in bijection with its support -/
noncomputable def IsCycle.zpowersEquivSupport {σ : Perm α} (hσ : IsCycle σ) :
(Subgroup.zpowers σ) ≃ σ.support :=
Equiv.ofBijective
(fun (τ : ↥ ((Subgroup.zpowers σ) : Set (Perm α))) =>
⟨(τ : Perm α) (Classical.choose hσ), by
obtain ⟨τ, n, rfl⟩ := τ
rw [Subtype.coe_mk, zpow_apply_mem_support, mem_support]
exact (Classical.choose_spec hσ).1⟩)
(by
constructor
· rintro ⟨a, m, rfl⟩ ⟨b, n, rfl⟩ h
ext y
by_cases hy : σ y = y
· simp_rw [zpow_apply_eq_self_of_apply_eq_self hy]
· obtain ⟨i, rfl⟩ := (Classical.choose_spec hσ).2 hy
rw [Subtype.coe_mk, Subtype.coe_mk, zpow_apply_comm σ m i, zpow_apply_comm σ n i]
exact congr_arg _ (Subtype.ext_iff.mp h)
· rintro ⟨y, hy⟩
rw [mem_support] at hy
obtain ⟨n, rfl⟩ := (Classical.choose_spec hσ).2 hy
exact ⟨⟨σ ^ n, n, rfl⟩, rfl⟩)
@[simp]
theorem IsCycle.zpowersEquivSupport_apply {σ : Perm α} (hσ : IsCycle σ) {n : ℕ} :
hσ.zpowersEquivSupport ⟨σ ^ n, n, rfl⟩ =
⟨(σ ^ n) (Classical.choose hσ),
pow_apply_mem_support.2 (mem_support.2 (Classical.choose_spec hσ).1)⟩ :=
rfl
@[simp]
theorem IsCycle.zpowersEquivSupport_symm_apply {σ : Perm α} (hσ : IsCycle σ) (n : ℕ) :
hσ.zpowersEquivSupport.symm
⟨(σ ^ n) (Classical.choose hσ),
pow_apply_mem_support.2 (mem_support.2 (Classical.choose_spec hσ).1)⟩ =
⟨σ ^ n, n, rfl⟩ :=
(Equiv.symm_apply_eq _).2 hσ.zpowersEquivSupport_apply
protected theorem IsCycle.orderOf (hf : IsCycle f) : orderOf f = #f.support := by
rw [← Fintype.card_zpowers, ← Fintype.card_coe]
convert Fintype.card_congr (IsCycle.zpowersEquivSupport hf)
theorem isCycle_swap_mul_aux₁ {α : Type*} [DecidableEq α] :
∀ (n : ℕ) {b x : α} {f : Perm α} (_ : (swap x (f x) * f) b ≠ b) (_ : (f ^ n) (f x) = b),
∃ i : ℤ, ((swap x (f x) * f) ^ i) (f x) = b := by
intro n
induction n with
| zero => exact fun _ h => ⟨0, h⟩
| succ n hn =>
intro b x f hb h
exact if hfbx : f x = b then ⟨0, hfbx⟩
else
have : f b ≠ b ∧ b ≠ x := ne_and_ne_of_swap_mul_apply_ne_self hb
have hb' : (swap x (f x) * f) (f⁻¹ b) ≠ f⁻¹ b := by
rw [mul_apply, apply_inv_self, swap_apply_of_ne_of_ne this.2 (Ne.symm hfbx), Ne, ←
f.injective.eq_iff, apply_inv_self]
exact this.1
let ⟨i, hi⟩ := hn hb' (f.injective <| by
rw [apply_inv_self]; rwa [pow_succ', mul_apply] at h)
⟨i + 1, by
rw [add_comm, zpow_add, mul_apply, hi, zpow_one, mul_apply, apply_inv_self,
swap_apply_of_ne_of_ne (ne_and_ne_of_swap_mul_apply_ne_self hb).2 (Ne.symm hfbx)]⟩
theorem isCycle_swap_mul_aux₂ {α : Type*} [DecidableEq α] :
∀ (n : ℤ) {b x : α} {f : Perm α} (_ : (swap x (f x) * f) b ≠ b) (_ : (f ^ n) (f x) = b),
∃ i : ℤ, ((swap x (f x) * f) ^ i) (f x) = b := by
intro n
cases n with
| ofNat n => exact isCycle_swap_mul_aux₁ n
| negSucc n =>
intro b x f hb h
exact if hfbx' : f x = b then ⟨0, hfbx'⟩
else
have : f b ≠ b ∧ b ≠ x := ne_and_ne_of_swap_mul_apply_ne_self hb
have hb : (swap x (f⁻¹ x) * f⁻¹) (f⁻¹ b) ≠ f⁻¹ b := by
rw [mul_apply, swap_apply_def]
split_ifs <;>
simp only [inv_eq_iff_eq, Perm.mul_apply, zpow_negSucc, Ne, Perm.apply_inv_self] at *
<;> tauto
let ⟨i, hi⟩ :=
isCycle_swap_mul_aux₁ n hb
(show (f⁻¹ ^ n) (f⁻¹ x) = f⁻¹ b by
rw [← zpow_natCast, ← h, ← mul_apply, ← mul_apply, ← mul_apply, zpow_negSucc,
← inv_pow, pow_succ, mul_assoc, mul_assoc, inv_mul_cancel, mul_one, zpow_natCast,
← pow_succ', ← pow_succ])
have h : (swap x (f⁻¹ x) * f⁻¹) (f x) = f⁻¹ x := by
rw [mul_apply, inv_apply_self, swap_apply_left]
⟨-i, by
rw [← add_sub_cancel_right i 1, neg_sub, sub_eq_add_neg, zpow_add, zpow_one, zpow_neg,
← inv_zpow, mul_inv_rev, swap_inv, mul_swap_eq_swap_mul, inv_apply_self, swap_comm _ x,
zpow_add, zpow_one, mul_apply, mul_apply (_ ^ i), h, hi, mul_apply, apply_inv_self,
swap_apply_of_ne_of_ne this.2 (Ne.symm hfbx')]⟩
theorem IsCycle.eq_swap_of_apply_apply_eq_self {α : Type*} [DecidableEq α] {f : Perm α}
(hf : IsCycle f) {x : α} (hfx : f x ≠ x) (hffx : f (f x) = x) : f = swap x (f x) :=
Equiv.ext fun y =>
let ⟨z, hz⟩ := hf
let ⟨i, hi⟩ := hz.2 hfx
if hyx : y = x then by simp [hyx]
else
if hfyx : y = f x then by simp [hfyx, hffx]
else by
rw [swap_apply_of_ne_of_ne hyx hfyx]
refine by_contradiction fun hy => ?_
obtain ⟨j, hj⟩ := hz.2 hy
rw [← sub_add_cancel j i, zpow_add, mul_apply, hi] at hj
rcases zpow_apply_eq_of_apply_apply_eq_self hffx (j - i) with hji | hji
· rw [← hj, hji] at hyx
tauto
· rw [← hj, hji] at hfyx
tauto
theorem IsCycle.swap_mul {α : Type*} [DecidableEq α] {f : Perm α} (hf : IsCycle f) {x : α}
(hx : f x ≠ x) (hffx : f (f x) ≠ x) : IsCycle (swap x (f x) * f) :=
⟨f x, by simp [swap_apply_def, mul_apply, if_neg hffx, f.injective.eq_iff, if_neg hx, hx],
fun y hy =>
let ⟨i, hi⟩ := hf.exists_zpow_eq hx (ne_and_ne_of_swap_mul_apply_ne_self hy).1
have hi : (f ^ (i - 1)) (f x) = y :=
calc
(f ^ (i - 1) : Perm α) (f x) = (f ^ (i - 1) * f ^ (1 : ℤ) : Perm α) x := by simp
_ = y := by rwa [← zpow_add, sub_add_cancel]
isCycle_swap_mul_aux₂ (i - 1) hy hi⟩
theorem IsCycle.sign {f : Perm α} (hf : IsCycle f) : sign f = -(-1) ^ #f.support :=
let ⟨x, hx⟩ := hf
calc
Perm.sign f = Perm.sign (swap x (f x) * (swap x (f x) * f)) := by
{rw [← mul_assoc, mul_def, mul_def, swap_swap, trans_refl]}
_ = -(-1) ^ #f.support :=
if h1 : f (f x) = x then by
have h : swap x (f x) * f = 1 := by
simp only [mul_def, one_def]
rw [hf.eq_swap_of_apply_apply_eq_self hx.1 h1, swap_apply_left, swap_swap]
rw [sign_mul, sign_swap hx.1.symm, h, sign_one,
hf.eq_swap_of_apply_apply_eq_self hx.1 h1, card_support_swap hx.1.symm]
rfl
else by
have h : #(swap x (f x) * f).support + 1 = #f.support := by
rw [← insert_erase (mem_support.2 hx.1), support_swap_mul_eq _ _ h1,
card_insert_of_not_mem (not_mem_erase _ _), sdiff_singleton_eq_erase]
have : #(swap x (f x) * f).support < #f.support := card_support_swap_mul hx.1
rw [sign_mul, sign_swap hx.1.symm, (hf.swap_mul hx.1 h1).sign, ← h]
simp only [mul_neg, neg_mul, one_mul, neg_neg, pow_add, pow_one, mul_one]
termination_by #f.support
theorem IsCycle.of_pow {n : ℕ} (h1 : IsCycle (f ^ n)) (h2 : f.support ⊆ (f ^ n).support) :
IsCycle f := by
have key : ∀ x : α, (f ^ n) x ≠ x ↔ f x ≠ x := by
simp_rw [← mem_support, ← Finset.ext_iff]
exact (support_pow_le _ n).antisymm h2
obtain ⟨x, hx1, hx2⟩ := h1
refine ⟨x, (key x).mp hx1, fun y hy => ?_⟩
obtain ⟨i, _⟩ := hx2 ((key y).mpr hy)
exact ⟨n * i, by rwa [zpow_mul]⟩
-- The lemma `support_zpow_le` is relevant. It means that `h2` is equivalent to
-- `σ.support = (σ ^ n).support`, as well as to `#σ.support ≤ #(σ ^ n).support`.
theorem IsCycle.of_zpow {n : ℤ} (h1 : IsCycle (f ^ n)) (h2 : f.support ⊆ (f ^ n).support) :
IsCycle f := by
cases n
· exact h1.of_pow h2
· simp only [le_eq_subset, zpow_negSucc, Perm.support_inv] at h1 h2
exact (inv_inv (f ^ _) ▸ h1.inv).of_pow h2
theorem nodup_of_pairwise_disjoint_cycles {l : List (Perm β)} (h1 : ∀ f ∈ l, IsCycle f)
(h2 : l.Pairwise Disjoint) : l.Nodup :=
nodup_of_pairwise_disjoint (fun h => (h1 1 h).ne_one rfl) h2
/-- Unlike `support_congr`, which assumes that `∀ (x ∈ g.support), f x = g x)`, here
we have the weaker assumption that `∀ (x ∈ f.support), f x = g x`. -/
theorem IsCycle.support_congr (hf : IsCycle f) (hg : IsCycle g) (h : f.support ⊆ g.support)
(h' : ∀ x ∈ f.support, f x = g x) : f = g := by
have : f.support = g.support := by
refine le_antisymm h ?_
intro z hz
obtain ⟨x, hx, _⟩ := id hf
have hx' : g x ≠ x := by rwa [← h' x (mem_support.mpr hx)]
obtain ⟨m, hm⟩ := hg.exists_pow_eq hx' (mem_support.mp hz)
have h'' : ∀ x ∈ f.support ∩ g.support, f x = g x := by
intro x hx
exact h' x (mem_of_mem_inter_left hx)
rwa [← hm, ←
pow_eq_on_of_mem_support h'' _ x
(mem_inter_of_mem (mem_support.mpr hx) (mem_support.mpr hx')),
pow_apply_mem_support, mem_support]
refine Equiv.Perm.support_congr h ?_
simpa [← this] using h'
/-- If two cyclic permutations agree on all terms in their intersection,
and that intersection is not empty, then the two cyclic permutations must be equal. -/
theorem IsCycle.eq_on_support_inter_nonempty_congr (hf : IsCycle f) (hg : IsCycle g)
(h : ∀ x ∈ f.support ∩ g.support, f x = g x)
(hx : f x = g x) (hx' : x ∈ f.support) : f = g := by
have hx'' : x ∈ g.support := by rwa [mem_support, ← hx, ← mem_support]
have : f.support ⊆ g.support := by
intro y hy
obtain ⟨k, rfl⟩ := hf.exists_pow_eq (mem_support.mp hx') (mem_support.mp hy)
rwa [pow_eq_on_of_mem_support h _ _ (mem_inter_of_mem hx' hx''), pow_apply_mem_support]
rw [inter_eq_left.mpr this] at h
exact hf.support_congr hg this h
theorem IsCycle.support_pow_eq_iff (hf : IsCycle f) {n : ℕ} :
support (f ^ n) = support f ↔ ¬orderOf f ∣ n := by
rw [orderOf_dvd_iff_pow_eq_one]
constructor
· intro h H
refine hf.ne_one ?_
rw [← support_eq_empty_iff, ← h, H, support_one]
· intro H
apply le_antisymm (support_pow_le _ n) _
intro x hx
contrapose! H
ext z
by_cases hz : f z = z
· rw [pow_apply_eq_self_of_apply_eq_self hz, one_apply]
· obtain ⟨k, rfl⟩ := hf.exists_pow_eq hz (mem_support.mp hx)
apply (f ^ k).injective
rw [← mul_apply, (Commute.pow_pow_self _ _ _).eq, mul_apply]
simpa using H
theorem IsCycle.support_pow_of_pos_of_lt_orderOf (hf : IsCycle f) {n : ℕ} (npos : 0 < n)
(hn : n < orderOf f) : (f ^ n).support = f.support :=
hf.support_pow_eq_iff.2 <| Nat.not_dvd_of_pos_of_lt npos hn
theorem IsCycle.pow_iff [Finite β] {f : Perm β} (hf : IsCycle f) {n : ℕ} :
IsCycle (f ^ n) ↔ n.Coprime (orderOf f) := by
classical
cases nonempty_fintype β
constructor
· intro h
have hr : support (f ^ n) = support f := by
rw [hf.support_pow_eq_iff]
rintro ⟨k, rfl⟩
refine h.ne_one ?_
simp [pow_mul, pow_orderOf_eq_one]
have : orderOf (f ^ n) = orderOf f := by rw [h.orderOf, hr, hf.orderOf]
rw [orderOf_pow, Nat.div_eq_self] at this
rcases this with h | _
· exact absurd h (orderOf_pos _).ne'
· rwa [Nat.coprime_iff_gcd_eq_one, Nat.gcd_comm]
· intro h
obtain ⟨m, hm⟩ := exists_pow_eq_self_of_coprime h
have hf' : IsCycle ((f ^ n) ^ m) := by rwa [hm]
refine hf'.of_pow fun x hx => ?_
rw [hm]
exact support_pow_le _ n hx
-- TODO: Define a `Set`-valued support to get rid of the `Finite β` assumption
theorem IsCycle.pow_eq_one_iff [Finite β] {f : Perm β} (hf : IsCycle f) {n : ℕ} :
f ^ n = 1 ↔ ∃ x, f x ≠ x ∧ (f ^ n) x = x := by
classical
cases nonempty_fintype β
constructor
· intro h
obtain ⟨x, hx, -⟩ := id hf
exact ⟨x, hx, by simp [h]⟩
· rintro ⟨x, hx, hx'⟩
by_cases h : support (f ^ n) = support f
· rw [← mem_support, ← h, mem_support] at hx
contradiction
· rw [hf.support_pow_eq_iff, Classical.not_not] at h
obtain ⟨k, rfl⟩ := h
rw [pow_mul, pow_orderOf_eq_one, one_pow]
-- TODO: Define a `Set`-valued support to get rid of the `Finite β` assumption
theorem IsCycle.pow_eq_one_iff' [Finite β] {f : Perm β} (hf : IsCycle f) {n : ℕ} {x : β}
(hx : f x ≠ x) : f ^ n = 1 ↔ (f ^ n) x = x :=
⟨fun h => DFunLike.congr_fun h x, fun h => hf.pow_eq_one_iff.2 ⟨x, hx, h⟩⟩
-- TODO: Define a `Set`-valued support to get rid of the `Finite β` assumption
theorem IsCycle.pow_eq_one_iff'' [Finite β] {f : Perm β} (hf : IsCycle f) {n : ℕ} :
f ^ n = 1 ↔ ∀ x, f x ≠ x → (f ^ n) x = x :=
⟨fun h _ hx => (hf.pow_eq_one_iff' hx).1 h, fun h =>
let ⟨_, hx, _⟩ := id hf
(hf.pow_eq_one_iff' hx).2 (h _ hx)⟩
-- TODO: Define a `Set`-valued support to get rid of the `Finite β` assumption
theorem IsCycle.pow_eq_pow_iff [Finite β] {f : Perm β} (hf : IsCycle f) {a b : ℕ} :
f ^ a = f ^ b ↔ ∃ x, f x ≠ x ∧ (f ^ a) x = (f ^ b) x := by
classical
cases nonempty_fintype β
constructor
· intro h
obtain ⟨x, hx, -⟩ := id hf
exact ⟨x, hx, by simp [h]⟩
· rintro ⟨x, hx, hx'⟩
wlog hab : a ≤ b generalizing a b
· exact (this hx'.symm (le_of_not_le hab)).symm
suffices f ^ (b - a) = 1 by
rw [pow_sub _ hab, mul_inv_eq_one] at this
rw [this]
rw [hf.pow_eq_one_iff]
by_cases hfa : (f ^ a) x ∈ f.support
· refine ⟨(f ^ a) x, mem_support.mp hfa, ?_⟩
simp only [pow_sub _ hab, Equiv.Perm.coe_mul, Function.comp_apply, inv_apply_self, ← hx']
· have h := @Equiv.Perm.zpow_apply_comm _ f 1 a x
simp only [zpow_one, zpow_natCast] at h
rw [not_mem_support, h, Function.Injective.eq_iff (f ^ a).injective] at hfa
contradiction
theorem IsCycle.isCycle_pow_pos_of_lt_prime_order [Finite β] {f : Perm β} (hf : IsCycle f)
(hf' : (orderOf f).Prime) (n : ℕ) (hn : 0 < n) (hn' : n < orderOf f) : IsCycle (f ^ n) := by
classical
cases nonempty_fintype β
have : n.Coprime (orderOf f) := by
refine Nat.Coprime.symm ?_
rw [Nat.Prime.coprime_iff_not_dvd hf']
exact Nat.not_dvd_of_pos_of_lt hn hn'
obtain ⟨m, hm⟩ := exists_pow_eq_self_of_coprime this
have hf'' := hf
rw [← hm] at hf''
refine hf''.of_pow ?_
rw [hm]
exact support_pow_le f n
end IsCycle
open Equiv
theorem _root_.Int.addLeft_one_isCycle : (Equiv.addLeft 1 : Perm ℤ).IsCycle :=
⟨0, one_ne_zero, fun n _ => ⟨n, by simp⟩⟩
theorem _root_.Int.addRight_one_isCycle : (Equiv.addRight 1 : Perm ℤ).IsCycle :=
⟨0, one_ne_zero, fun n _ => ⟨n, by simp⟩⟩
section Conjugation
variable [Fintype α] [DecidableEq α] {σ τ : Perm α}
theorem IsCycle.isConj (hσ : IsCycle σ) (hτ : IsCycle τ) (h : #σ.support = #τ.support) :
IsConj σ τ := by
refine
isConj_of_support_equiv
(hσ.zpowersEquivSupport.symm.trans <|
(zpowersEquivZPowers <| by rw [hσ.orderOf, h, hτ.orderOf]).trans hτ.zpowersEquivSupport)
?_
intro x hx
simp only [Perm.mul_apply, Equiv.trans_apply, Equiv.sumCongr_apply]
obtain ⟨n, rfl⟩ := hσ.exists_pow_eq (Classical.choose_spec hσ).1 (mem_support.1 hx)
simp [← Perm.mul_apply, ← pow_succ']
theorem IsCycle.isConj_iff (hσ : IsCycle σ) (hτ : IsCycle τ) :
IsConj σ τ ↔ #σ.support = #τ.support where
mp h := by
obtain ⟨π, rfl⟩ := (_root_.isConj_iff).1 h
refine Finset.card_bij (fun a _ => π a) (fun _ ha => ?_) (fun _ _ _ _ ab => π.injective ab)
fun b hb ↦ ⟨π⁻¹ b, ?_, π.apply_inv_self b⟩
· simp [mem_support.1 ha]
contrapose! hb
rw [mem_support, Classical.not_not] at hb
rw [mem_support, Classical.not_not, Perm.mul_apply, Perm.mul_apply, hb, Perm.apply_inv_self]
mpr := hσ.isConj hτ
end Conjugation
/-! ### `IsCycleOn` -/
section IsCycleOn
variable {f g : Perm α} {s t : Set α} {a b x y : α}
/-- A permutation is a cycle on `s` when any two points of `s` are related by repeated application
of the permutation. Note that this means the identity is a cycle of subsingleton sets. -/
def IsCycleOn (f : Perm α) (s : Set α) : Prop :=
Set.BijOn f s s ∧ ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → f.SameCycle x y
@[simp]
theorem isCycleOn_empty : f.IsCycleOn ∅ := by simp [IsCycleOn, Set.bijOn_empty]
@[simp]
theorem isCycleOn_one : (1 : Perm α).IsCycleOn s ↔ s.Subsingleton := by
simp [IsCycleOn, Set.bijOn_id, Set.Subsingleton]
alias ⟨IsCycleOn.subsingleton, _root_.Set.Subsingleton.isCycleOn_one⟩ := isCycleOn_one
@[simp]
theorem isCycleOn_singleton : f.IsCycleOn {a} ↔ f a = a := by simp [IsCycleOn, SameCycle.rfl]
theorem isCycleOn_of_subsingleton [Subsingleton α] (f : Perm α) (s : Set α) : f.IsCycleOn s :=
⟨s.bijOn_of_subsingleton _, fun x _ y _ => (Subsingleton.elim x y).sameCycle _⟩
@[simp]
theorem isCycleOn_inv : f⁻¹.IsCycleOn s ↔ f.IsCycleOn s := by
simp only [IsCycleOn, sameCycle_inv, and_congr_left_iff]
exact fun _ ↦ ⟨fun h ↦ Set.BijOn.perm_inv h, fun h ↦ Set.BijOn.perm_inv h⟩
alias ⟨IsCycleOn.of_inv, IsCycleOn.inv⟩ := isCycleOn_inv
theorem IsCycleOn.conj (h : f.IsCycleOn s) : (g * f * g⁻¹).IsCycleOn ((g : Perm α) '' s) :=
⟨(g.bijOn_image.comp h.1).comp g.bijOn_symm_image, fun x hx y hy => by
rw [← preimage_inv] at hx hy
convert Equiv.Perm.SameCycle.conj (h.2 hx hy) (g := g) <;> rw [apply_inv_self]⟩
theorem isCycleOn_swap [DecidableEq α] (hab : a ≠ b) : (swap a b).IsCycleOn {a, b} :=
⟨bijOn_swap (by simp) (by simp), fun x hx y hy => by
rw [Set.mem_insert_iff, Set.mem_singleton_iff] at hx hy
obtain rfl | rfl := hx <;> obtain rfl | rfl := hy
· exact ⟨0, by rw [zpow_zero, coe_one, id]⟩
· exact ⟨1, by rw [zpow_one, swap_apply_left]⟩
· exact ⟨1, by rw [zpow_one, swap_apply_right]⟩
· exact ⟨0, by rw [zpow_zero, coe_one, id]⟩⟩
protected theorem IsCycleOn.apply_ne (hf : f.IsCycleOn s) (hs : s.Nontrivial) (ha : a ∈ s) :
f a ≠ a := by
obtain ⟨b, hb, hba⟩ := hs.exists_ne a
obtain ⟨n, rfl⟩ := hf.2 ha hb
exact fun h => hba (IsFixedPt.perm_zpow h n)
protected theorem IsCycle.isCycleOn (hf : f.IsCycle) : f.IsCycleOn { x | f x ≠ x } :=
⟨f.bijOn fun _ => f.apply_eq_iff_eq.not, fun _ ha _ => hf.sameCycle ha⟩
/-- This lemma demonstrates the relation between `Equiv.Perm.IsCycle` and `Equiv.Perm.IsCycleOn`
in non-degenerate cases. -/
theorem isCycle_iff_exists_isCycleOn :
f.IsCycle ↔ ∃ s : Set α, s.Nontrivial ∧ f.IsCycleOn s ∧ ∀ ⦃x⦄, ¬IsFixedPt f x → x ∈ s := by
refine ⟨fun hf => ⟨{ x | f x ≠ x }, ?_, hf.isCycleOn, fun _ => id⟩, ?_⟩
· obtain ⟨a, ha⟩ := hf
exact ⟨f a, f.injective.ne ha.1, a, ha.1, ha.1⟩
· rintro ⟨s, hs, hf, hsf⟩
obtain ⟨a, ha⟩ := hs.nonempty
exact ⟨a, hf.apply_ne hs ha, fun b hb => hf.2 ha <| hsf hb⟩
theorem IsCycleOn.apply_mem_iff (hf : f.IsCycleOn s) : f x ∈ s ↔ x ∈ s :=
⟨fun hx => by
convert hf.1.perm_inv.1 hx
rw [inv_apply_self], fun hx => hf.1.mapsTo hx⟩
/-- Note that the identity satisfies `IsCycleOn` for any subsingleton set, but not `IsCycle`. -/
theorem IsCycleOn.isCycle_subtypePerm (hf : f.IsCycleOn s) (hs : s.Nontrivial) :
(f.subtypePerm fun _ => hf.apply_mem_iff.symm : Perm s).IsCycle := by
obtain ⟨a, ha⟩ := hs.nonempty
exact
⟨⟨a, ha⟩, ne_of_apply_ne ((↑) : s → α) (hf.apply_ne hs ha), fun b _ =>
(hf.2 (⟨a, ha⟩ : s).2 b.2).subtypePerm⟩
/-- Note that the identity is a cycle on any subsingleton set, but not a cycle. -/
protected theorem IsCycleOn.subtypePerm (hf : f.IsCycleOn s) :
(f.subtypePerm fun _ => hf.apply_mem_iff.symm : Perm s).IsCycleOn _root_.Set.univ := by
obtain hs | hs := s.subsingleton_or_nontrivial
· haveI := hs.coe_sort
exact isCycleOn_of_subsingleton _ _
convert (hf.isCycle_subtypePerm hs).isCycleOn
rw [eq_comm, Set.eq_univ_iff_forall]
exact fun x => ne_of_apply_ne ((↑) : s → α) (hf.apply_ne hs x.2)
-- TODO: Theory of order of an element under an action
theorem IsCycleOn.pow_apply_eq {s : Finset α} (hf : f.IsCycleOn s) (ha : a ∈ s) {n : ℕ} :
(f ^ n) a = a ↔ #s ∣ n := by
obtain rfl | hs := Finset.eq_singleton_or_nontrivial ha
· rw [coe_singleton, isCycleOn_singleton] at hf
simpa using IsFixedPt.iterate hf n
classical
have h (x : s) : ¬f x = x := hf.apply_ne hs x.2
have := (hf.isCycle_subtypePerm hs).orderOf
simp only [coe_sort_coe, support_subtype_perm, ne_eq, h, not_false_eq_true, univ_eq_attach,
mem_attach, imp_self, implies_true, filter_true_of_mem, card_attach] at this
rw [← this, orderOf_dvd_iff_pow_eq_one,
(hf.isCycle_subtypePerm hs).pow_eq_one_iff'
(ne_of_apply_ne ((↑) : s → α) <| hf.apply_ne hs (⟨a, ha⟩ : s).2)]
simp [-coe_sort_coe]
theorem IsCycleOn.zpow_apply_eq {s : Finset α} (hf : f.IsCycleOn s) (ha : a ∈ s) :
∀ {n : ℤ}, (f ^ n) a = a ↔ (#s : ℤ) ∣ n
| Int.ofNat _ => (hf.pow_apply_eq ha).trans Int.natCast_dvd_natCast.symm
| Int.negSucc n => by
rw [zpow_negSucc, ← inv_pow]
exact (hf.inv.pow_apply_eq ha).trans (dvd_neg.trans Int.natCast_dvd_natCast).symm
theorem IsCycleOn.pow_apply_eq_pow_apply {s : Finset α} (hf : f.IsCycleOn s) (ha : a ∈ s)
{m n : ℕ} : (f ^ m) a = (f ^ n) a ↔ m ≡ n [MOD #s] := by
rw [Nat.modEq_iff_dvd, ← hf.zpow_apply_eq ha]
simp [sub_eq_neg_add, zpow_add, eq_inv_iff_eq, eq_comm]
theorem IsCycleOn.zpow_apply_eq_zpow_apply {s : Finset α} (hf : f.IsCycleOn s) (ha : a ∈ s)
{m n : ℤ} : (f ^ m) a = (f ^ n) a ↔ m ≡ n [ZMOD #s] := by
rw [Int.modEq_iff_dvd, ← hf.zpow_apply_eq ha]
simp [sub_eq_neg_add, zpow_add, eq_inv_iff_eq, eq_comm]
theorem IsCycleOn.pow_card_apply {s : Finset α} (hf : f.IsCycleOn s) (ha : a ∈ s) :
(f ^ #s) a = a :=
(hf.pow_apply_eq ha).2 dvd_rfl
theorem IsCycleOn.exists_pow_eq {s : Finset α} (hf : f.IsCycleOn s) (ha : a ∈ s) (hb : b ∈ s) :
∃ n < #s, (f ^ n) a = b := by
classical
obtain ⟨n, rfl⟩ := hf.2 ha hb
obtain ⟨k, hk⟩ := (Int.mod_modEq n #s).symm.dvd
refine ⟨n.natMod #s, Int.natMod_lt (Nonempty.card_pos ⟨a, ha⟩).ne', ?_⟩
rw [← zpow_natCast, Int.natMod,
Int.toNat_of_nonneg (Int.emod_nonneg _ <| Nat.cast_ne_zero.2
(Nonempty.card_pos ⟨a, ha⟩).ne'), sub_eq_iff_eq_add'.1 hk, zpow_add, zpow_mul]
simp only [zpow_natCast, coe_mul, comp_apply, EmbeddingLike.apply_eq_iff_eq]
exact IsFixedPt.perm_zpow (hf.pow_card_apply ha) _
theorem IsCycleOn.exists_pow_eq' (hs : s.Finite) (hf : f.IsCycleOn s) (ha : a ∈ s) (hb : b ∈ s) :
∃ n : ℕ, (f ^ n) a = b := by
lift s to Finset α using id hs
obtain ⟨n, -, hn⟩ := hf.exists_pow_eq ha hb
exact ⟨n, hn⟩
theorem IsCycleOn.range_pow (hs : s.Finite) (h : f.IsCycleOn s) (ha : a ∈ s) :
Set.range (fun n => (f ^ n) a : ℕ → α) = s :=
Set.Subset.antisymm (Set.range_subset_iff.2 fun _ => h.1.mapsTo.perm_pow _ ha) fun _ =>
h.exists_pow_eq' hs ha
theorem IsCycleOn.range_zpow (h : f.IsCycleOn s) (ha : a ∈ s) :
Set.range (fun n => (f ^ n) a : ℤ → α) = s :=
Set.Subset.antisymm (Set.range_subset_iff.2 fun _ => (h.1.perm_zpow _).mapsTo ha) <| h.2 ha
theorem IsCycleOn.of_pow {n : ℕ} (hf : (f ^ n).IsCycleOn s) (h : Set.BijOn f s s) : f.IsCycleOn s :=
⟨h, fun _ hx _ hy => (hf.2 hx hy).of_pow⟩
theorem IsCycleOn.of_zpow {n : ℤ} (hf : (f ^ n).IsCycleOn s) (h : Set.BijOn f s s) :
f.IsCycleOn s :=
⟨h, fun _ hx _ hy => (hf.2 hx hy).of_zpow⟩
theorem IsCycleOn.extendDomain {p : β → Prop} [DecidablePred p] (f : α ≃ Subtype p)
(h : g.IsCycleOn s) : (g.extendDomain f).IsCycleOn ((↑) ∘ f '' s) :=
⟨h.1.extendDomain, by
rintro _ ⟨a, ha, rfl⟩ _ ⟨b, hb, rfl⟩
exact (h.2 ha hb).extendDomain⟩
protected theorem IsCycleOn.countable (hs : f.IsCycleOn s) : s.Countable := by
obtain rfl | ⟨a, ha⟩ := s.eq_empty_or_nonempty
· exact Set.countable_empty
· exact (Set.countable_range fun n : ℤ => (⇑(f ^ n) : α → α) a).mono (hs.2 ha)
end IsCycleOn
end Equiv.Perm
namespace List
section
variable [DecidableEq α] {l : List α}
theorem Nodup.isCycleOn_formPerm (h : l.Nodup) :
l.formPerm.IsCycleOn { a | a ∈ l } := by
refine ⟨l.formPerm.bijOn fun _ => List.formPerm_mem_iff_mem, fun a ha b hb => ?_⟩
| rw [Set.mem_setOf, ← List.idxOf_lt_length_iff] at ha hb
rw [← List.getElem_idxOf ha, ← List.getElem_idxOf hb]
refine ⟨l.idxOf b - l.idxOf a, ?_⟩
simp only [sub_eq_neg_add, zpow_add, zpow_neg, Equiv.Perm.inv_eq_iff_eq, zpow_natCast,
| Mathlib/GroupTheory/Perm/Cycle/Basic.lean | 853 | 856 |
/-
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.Regularity.Chunk
import Mathlib.Combinatorics.SimpleGraph.Regularity.Energy
/-!
# Increment partition for Szemerédi Regularity Lemma
In the proof of Szemerédi Regularity Lemma, we need to partition each part of a starting partition
to increase the energy. This file defines the partition obtained by gluing the parts partitions
together (the *increment partition*) and shows that the energy globally increases.
This entire file is internal to the proof of Szemerédi Regularity Lemma.
## Main declarations
* `SzemerediRegularity.increment`: The increment partition.
* `SzemerediRegularity.card_increment`: The increment partition is much bigger than the original,
but by a controlled amount.
* `SzemerediRegularity.energy_increment`: The increment partition has energy greater than the
original by a known (small) fixed amount.
## TODO
Once ported to mathlib4, this file will be a great golfing ground for Heather's new tactic
`gcongr`.
## References
[Yaël Dillies, Bhavik Mehta, *Formalising Szemerédi’s Regularity Lemma in Lean*][srl_itp]
-/
open Finset Fintype SimpleGraph SzemerediRegularity
open scoped SzemerediRegularity.Positivity
variable {α : Type*} [Fintype α] [DecidableEq α] {P : Finpartition (univ : Finset α)}
(hP : P.IsEquipartition) (G : SimpleGraph α) [DecidableRel G.Adj] (ε : ℝ)
local notation3 "m" => (card α / stepBound #P.parts : ℕ)
namespace SzemerediRegularity
/-- The **increment partition** in Szemerédi's Regularity Lemma.
If an equipartition is *not* uniform, then the increment partition is a (much bigger) equipartition
with a slightly higher energy. This is helpful since the energy is bounded by a constant (see
`Finpartition.energy_le_one`), so this process eventually terminates and yields a
not-too-big uniform equipartition. -/
noncomputable def increment : Finpartition (univ : Finset α) :=
P.bind fun _ => chunk hP G ε
open Finpartition Finpartition.IsEquipartition
variable {hP G ε}
/-- The increment partition has a prescribed (very big) size in terms of the original partition. -/
theorem card_increment (hPα : #P.parts * 16 ^ #P.parts ≤ card α) (hPG : ¬P.IsUniform G ε) :
#(increment hP G ε).parts = stepBound #P.parts := by
have hPα' : stepBound #P.parts ≤ card α :=
(mul_le_mul_left' (pow_le_pow_left' (by norm_num) _) _).trans hPα
have hPpos : 0 < stepBound #P.parts := stepBound_pos (nonempty_of_not_uniform hPG).card_pos
rw [increment, card_bind]
simp_rw [chunk, apply_dite Finpartition.parts, apply_dite card, sum_dite]
rw [sum_const_nat, sum_const_nat, univ_eq_attach, univ_eq_attach, card_attach, card_attach]
any_goals exact fun x hx => card_parts_equitabilise _ _ (Nat.div_pos hPα' hPpos).ne'
rw [Nat.sub_add_cancel a_add_one_le_four_pow_parts_card,
Nat.sub_add_cancel ((Nat.le_succ _).trans a_add_one_le_four_pow_parts_card), ← add_mul]
congr
rw [filter_card_add_filter_neg_card_eq_card, card_attach]
variable (hP G ε)
theorem increment_isEquipartition : (increment hP G ε).IsEquipartition := by
simp_rw [IsEquipartition, Set.equitableOn_iff_exists_eq_eq_add_one]
refine ⟨m, fun A hA => ?_⟩
rw [mem_coe, increment, mem_bind] at hA
obtain ⟨U, hU, hA⟩ := hA
exact card_eq_of_mem_parts_chunk hA
/-- The contribution to `Finpartition.energy` of a pair of distinct parts of a `Finpartition`. -/
private noncomputable def distinctPairs (x : {x // x ∈ P.parts.offDiag}) :
Finset (Finset α × Finset α) :=
(chunk hP G ε (mem_offDiag.1 x.2).1).parts ×ˢ (chunk hP G ε (mem_offDiag.1 x.2).2.1).parts
variable {hP G ε}
private theorem distinctPairs_increment :
P.parts.offDiag.attach.biUnion (distinctPairs hP G ε) ⊆ (increment hP G ε).parts.offDiag := by
rintro ⟨Ui, Vj⟩
simp only [distinctPairs, increment, mem_offDiag, bind_parts, mem_biUnion, Prod.exists,
exists_and_left, exists_prop, mem_product, mem_attach, true_and, Subtype.exists, and_imp,
mem_offDiag, forall_exists_index, exists₂_imp, Ne]
refine fun U V hUV hUi hVj => ⟨⟨_, hUV.1, hUi⟩, ⟨_, hUV.2.1, hVj⟩, ?_⟩
rintro rfl
obtain ⟨i, hi⟩ := nonempty_of_mem_parts _ hUi
exact hUV.2.2 (P.disjoint.elim_finset hUV.1 hUV.2.1 i (Finpartition.le _ hUi hi) <|
Finpartition.le _ hVj hi)
private lemma pairwiseDisjoint_distinctPairs :
(P.parts.offDiag.attach : Set {x // x ∈ P.parts.offDiag}).PairwiseDisjoint
(distinctPairs hP G ε) := by
simp +unfoldPartialApp only [distinctPairs, Set.PairwiseDisjoint,
Function.onFun, disjoint_left, inf_eq_inter, mem_inter, mem_product]
rintro ⟨⟨s₁, s₂⟩, hs⟩ _ ⟨⟨t₁, t₂⟩, ht⟩ _ hst ⟨u, v⟩ huv₁ huv₂
rw [mem_offDiag] at hs ht
obtain ⟨a, ha⟩ := Finpartition.nonempty_of_mem_parts _ huv₁.1
obtain ⟨b, hb⟩ := Finpartition.nonempty_of_mem_parts _ huv₁.2
exact hst <| Subtype.ext_val <| Prod.ext
(P.disjoint.elim_finset hs.1 ht.1 a (Finpartition.le _ huv₁.1 ha) <|
Finpartition.le _ huv₂.1 ha) <|
P.disjoint.elim_finset hs.2.1 ht.2.1 b (Finpartition.le _ huv₁.2 hb) <|
Finpartition.le _ huv₂.2 hb
variable [Nonempty α]
lemma le_sum_distinctPairs_edgeDensity_sq (x : {i // i ∈ P.parts.offDiag}) (hε₁ : ε ≤ 1)
(hPα : #P.parts * 16 ^ #P.parts ≤ card α) (hPε : ↑100 ≤ ↑4 ^ #P.parts * ε ^ 5) :
(G.edgeDensity x.1.1 x.1.2 : ℝ) ^ 2 +
((if G.IsUniform ε x.1.1 x.1.2 then 0 else ε ^ 4 / 3) - ε ^ 5 / 25) ≤
(∑ i ∈ distinctPairs hP G ε x, G.edgeDensity i.1 i.2 ^ 2 : ℝ) / 16 ^ #P.parts := by
rw [distinctPairs, ← add_sub_assoc, add_sub_right_comm]
split_ifs with h
· rw [add_zero]
exact edgeDensity_chunk_uniform hPα hPε _ _
· exact edgeDensity_chunk_not_uniform hPα hPε hε₁ (mem_offDiag.1 x.2).2.2 h
/-- The increment partition has energy greater than the original one by a known fixed amount. -/
theorem energy_increment (hP : P.IsEquipartition) (hP₇ : 7 ≤ #P.parts)
(hPε : 100 ≤ 4 ^ #P.parts * ε ^ 5) (hPα : #P.parts * 16 ^ #P.parts ≤ card α)
(hPG : ¬P.IsUniform G ε) (hε₀ : 0 ≤ ε) (hε₁ : ε ≤ 1) :
↑(P.energy G) + ε ^ 5 / 4 ≤ (increment hP G ε).energy G := by
calc
_ = (∑ x ∈ P.parts.offDiag, (G.edgeDensity x.1 x.2 : ℝ) ^ 2 +
#P.parts ^ 2 * (ε ^ 5 / 4) : ℝ) / #P.parts ^ 2 := by
rw [coe_energy, add_div, mul_div_cancel_left₀]; positivity
_ ≤ (∑ x ∈ P.parts.offDiag.attach, (∑ i ∈ distinctPairs hP G ε x,
| G.edgeDensity i.1 i.2 ^ 2 : ℝ) / 16 ^ #P.parts) / #P.parts ^ 2 := ?_
_ = (∑ x ∈ P.parts.offDiag.attach, ∑ i ∈ distinctPairs hP G ε x,
G.edgeDensity i.1 i.2 ^ 2 : ℝ) / #(increment hP G ε).parts ^ 2 := by
rw [card_increment hPα hPG, coe_stepBound, mul_pow, pow_right_comm,
div_mul_eq_div_div_swap, ← sum_div]; norm_num
_ ≤ _ := by
rw [coe_energy]
gcongr
rw [← sum_biUnion pairwiseDisjoint_distinctPairs]
exact sum_le_sum_of_subset_of_nonneg distinctPairs_increment fun i _ _ ↦ sq_nonneg _
gcongr
rw [Finpartition.IsUniform, not_le, mul_tsub, mul_one, ← offDiag_card] at hPG
calc
_ ≤ ∑ x ∈ P.parts.offDiag, (edgeDensity G x.1 x.2 : ℝ) ^ 2 +
(#(nonUniforms P G ε) * (ε ^ 4 / 3) - #P.parts.offDiag * (ε ^ 5 / 25)) :=
add_le_add_left ?_ _
_ = ∑ x ∈ P.parts.offDiag, ((G.edgeDensity x.1 x.2 : ℝ) ^ 2 +
((if G.IsUniform ε x.1 x.2 then (0 : ℝ) else ε ^ 4 / 3) - ε ^ 5 / 25) : ℝ) := by
rw [sum_add_distrib, sum_sub_distrib, sum_const, nsmul_eq_mul, sum_ite, sum_const_zero,
zero_add, sum_const, nsmul_eq_mul, ← Finpartition.nonUniforms, ← add_sub_assoc,
add_sub_right_comm]
_ = _ := (sum_attach ..).symm
_ ≤ _ := sum_le_sum fun i _ ↦ le_sum_distinctPairs_edgeDensity_sq i hε₁ hPα hPε
calc
_ = (6/7 * #P.parts ^ 2) * ε ^ 5 * (7 / 24) := by ring
_ ≤ #P.parts.offDiag * ε ^ 5 * (22 / 75) := by
gcongr ?_ * _ * ?_
· rw [← mul_div_right_comm, div_le_iff₀ (by norm_num), offDiag_card]
norm_cast
rw [tsub_mul]
refine le_tsub_of_add_le_left ?_
nlinarith
· norm_num
_ = (#P.parts.offDiag * ε * (ε ^ 4 / 3) - #P.parts.offDiag * (ε ^ 5 / 25)) := by ring
_ ≤ (#(nonUniforms P G ε) * (ε ^ 4 / 3) - #P.parts.offDiag * (ε ^ 5 / 25)) := by gcongr
end SzemerediRegularity
| Mathlib/Combinatorics/SimpleGraph/Regularity/Increment.lean | 142 | 185 |
/-
Copyright (c) 2017 Johannes Hölzl. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johannes Hölzl
-/
import Mathlib.Data.Bool.Basic
import Mathlib.Order.Monotone.Basic
import Mathlib.Order.ULift
import Mathlib.Tactic.GCongr.CoreAttrs
/-!
# (Semi-)lattices
Semilattices are partially ordered sets with join (least upper bound, or `sup`) or meet (greatest
lower bound, or `inf`) operations. Lattices are posets that are both join-semilattices and
meet-semilattices.
Distributive lattices are lattices which satisfy any of four equivalent distributivity properties,
of `sup` over `inf`, on the left or on the right.
## Main declarations
* `SemilatticeSup`: a type class for join semilattices
* `SemilatticeSup.mk'`: an alternative constructor for `SemilatticeSup` via proofs that `⊔` is
commutative, associative and idempotent.
* `SemilatticeInf`: a type class for meet semilattices
* `SemilatticeSup.mk'`: an alternative constructor for `SemilatticeInf` via proofs that `⊓` is
commutative, associative and idempotent.
* `Lattice`: a type class for lattices
* `Lattice.mk'`: an alternative constructor for `Lattice` via proofs that `⊔` and `⊓` are
commutative, associative and satisfy a pair of "absorption laws".
* `DistribLattice`: a type class for distributive lattices.
## Notations
* `a ⊔ b`: the supremum or join of `a` and `b`
* `a ⊓ b`: the infimum or meet of `a` and `b`
## TODO
* (Semi-)lattice homomorphisms
* Alternative constructors for distributive lattices from the other distributive properties
## Tags
semilattice, lattice
-/
/-- See if the term is `a ⊂ b` and the goal is `a ⊆ b`. -/
@[gcongr_forward] def exactSubsetOfSSubset : Mathlib.Tactic.GCongr.ForwardExt where
eval h goal := do goal.assignIfDefEq (← Lean.Meta.mkAppM ``subset_of_ssubset #[h])
universe u v w
variable {α : Type u} {β : Type v}
/-!
### Join-semilattices
-/
-- TODO: automatic construction of dual definitions / theorems
/-- A `SemilatticeSup` is a join-semilattice, that is, a partial order
with a join (a.k.a. lub / least upper bound, sup / supremum) operation
`⊔` which is the least element larger than both factors. -/
class SemilatticeSup (α : Type u) extends PartialOrder α where
/-- The binary supremum, used to derive `Max α` -/
sup : α → α → α
/-- The supremum is an upper bound on the first argument -/
protected le_sup_left : ∀ a b : α, a ≤ sup a b
/-- The supremum is an upper bound on the second argument -/
protected le_sup_right : ∀ a b : α, b ≤ sup a b
/-- The supremum is the *least* upper bound -/
protected sup_le : ∀ a b c : α, a ≤ c → b ≤ c → sup a b ≤ c
instance SemilatticeSup.toMax [SemilatticeSup α] : Max α where max a b := SemilatticeSup.sup a b
/--
A type with a commutative, associative and idempotent binary `sup` operation has the structure of a
join-semilattice.
The partial order is defined so that `a ≤ b` unfolds to `a ⊔ b = b`; cf. `sup_eq_right`.
-/
def SemilatticeSup.mk' {α : Type*} [Max α] (sup_comm : ∀ a b : α, a ⊔ b = b ⊔ a)
(sup_assoc : ∀ a b c : α, a ⊔ b ⊔ c = a ⊔ (b ⊔ c)) (sup_idem : ∀ a : α, a ⊔ a = a) :
SemilatticeSup α where
sup := (· ⊔ ·)
le a b := a ⊔ b = b
le_refl := sup_idem
le_trans a b c hab hbc := by rw [← hbc, ← sup_assoc, hab]
le_antisymm a b hab hba := by rwa [← hba, sup_comm]
le_sup_left a b := by rw [← sup_assoc, sup_idem]
le_sup_right a b := by rw [sup_comm, sup_assoc, sup_idem]
sup_le a b c hac hbc := by rwa [sup_assoc, hbc]
section SemilatticeSup
variable [SemilatticeSup α] {a b c d : α}
@[simp]
theorem le_sup_left : a ≤ a ⊔ b :=
SemilatticeSup.le_sup_left a b
@[simp]
theorem le_sup_right : b ≤ a ⊔ b :=
SemilatticeSup.le_sup_right a b
theorem le_sup_of_le_left (h : c ≤ a) : c ≤ a ⊔ b :=
le_trans h le_sup_left
theorem le_sup_of_le_right (h : c ≤ b) : c ≤ a ⊔ b :=
le_trans h le_sup_right
theorem lt_sup_of_lt_left (h : c < a) : c < a ⊔ b :=
h.trans_le le_sup_left
theorem lt_sup_of_lt_right (h : c < b) : c < a ⊔ b :=
h.trans_le le_sup_right
theorem sup_le : a ≤ c → b ≤ c → a ⊔ b ≤ c :=
SemilatticeSup.sup_le a b c
@[simp]
theorem sup_le_iff : a ⊔ b ≤ c ↔ a ≤ c ∧ b ≤ c :=
⟨fun h : a ⊔ b ≤ c => ⟨le_trans le_sup_left h, le_trans le_sup_right h⟩,
fun ⟨h₁, h₂⟩ => sup_le h₁ h₂⟩
@[simp]
theorem sup_eq_left : a ⊔ b = a ↔ b ≤ a :=
le_antisymm_iff.trans <| by simp [le_rfl]
@[simp]
theorem sup_eq_right : a ⊔ b = b ↔ a ≤ b :=
le_antisymm_iff.trans <| by simp [le_rfl]
@[simp]
theorem left_eq_sup : a = a ⊔ b ↔ b ≤ a :=
eq_comm.trans sup_eq_left
@[simp]
theorem right_eq_sup : b = a ⊔ b ↔ a ≤ b :=
eq_comm.trans sup_eq_right
alias ⟨_, sup_of_le_left⟩ := sup_eq_left
alias ⟨le_of_sup_eq, sup_of_le_right⟩ := sup_eq_right
attribute [simp] sup_of_le_left sup_of_le_right
@[simp]
theorem left_lt_sup : a < a ⊔ b ↔ ¬b ≤ a :=
le_sup_left.lt_iff_ne.trans <| not_congr left_eq_sup
@[simp]
theorem right_lt_sup : b < a ⊔ b ↔ ¬a ≤ b :=
le_sup_right.lt_iff_ne.trans <| not_congr right_eq_sup
theorem left_or_right_lt_sup (h : a ≠ b) : a < a ⊔ b ∨ b < a ⊔ b :=
h.not_le_or_not_le.symm.imp left_lt_sup.2 right_lt_sup.2
theorem le_iff_exists_sup : a ≤ b ↔ ∃ c, b = a ⊔ c := by
constructor
· intro h
exact ⟨b, (sup_eq_right.mpr h).symm⟩
· rintro ⟨c, rfl : _ = _ ⊔ _⟩
exact le_sup_left
@[gcongr]
theorem sup_le_sup (h₁ : a ≤ b) (h₂ : c ≤ d) : a ⊔ c ≤ b ⊔ d :=
sup_le (le_sup_of_le_left h₁) (le_sup_of_le_right h₂)
@[gcongr]
theorem sup_le_sup_left (h₁ : a ≤ b) (c) : c ⊔ a ≤ c ⊔ b :=
sup_le_sup le_rfl h₁
@[gcongr]
theorem sup_le_sup_right (h₁ : a ≤ b) (c) : a ⊔ c ≤ b ⊔ c :=
sup_le_sup h₁ le_rfl
theorem sup_idem (a : α) : a ⊔ a = a := by simp
instance : Std.IdempotentOp (α := α) (· ⊔ ·) := ⟨sup_idem⟩
theorem sup_comm (a b : α) : a ⊔ b = b ⊔ a := by apply le_antisymm <;> simp
instance : Std.Commutative (α := α) (· ⊔ ·) := ⟨sup_comm⟩
theorem sup_assoc (a b c : α) : a ⊔ b ⊔ c = a ⊔ (b ⊔ c) :=
eq_of_forall_ge_iff fun x => by simp only [sup_le_iff]; rw [and_assoc]
instance : Std.Associative (α := α) (· ⊔ ·) := ⟨sup_assoc⟩
theorem sup_left_right_swap (a b c : α) : a ⊔ b ⊔ c = c ⊔ b ⊔ a := by
rw [sup_comm, sup_comm a, sup_assoc]
theorem sup_left_idem (a b : α) : a ⊔ (a ⊔ b) = a ⊔ b := by simp
theorem sup_right_idem (a b : α) : a ⊔ b ⊔ b = a ⊔ b := by simp
theorem sup_left_comm (a b c : α) : a ⊔ (b ⊔ c) = b ⊔ (a ⊔ c) := by
rw [← sup_assoc, ← sup_assoc, @sup_comm α _ a]
theorem sup_right_comm (a b c : α) : a ⊔ b ⊔ c = a ⊔ c ⊔ b := by
rw [sup_assoc, sup_assoc, sup_comm b]
theorem sup_sup_sup_comm (a b c d : α) : a ⊔ b ⊔ (c ⊔ d) = a ⊔ c ⊔ (b ⊔ d) := by
rw [sup_assoc, sup_left_comm b, ← sup_assoc]
theorem sup_sup_distrib_left (a b c : α) : a ⊔ (b ⊔ c) = a ⊔ b ⊔ (a ⊔ c) := by
rw [sup_sup_sup_comm, sup_idem]
theorem sup_sup_distrib_right (a b c : α) : a ⊔ b ⊔ c = a ⊔ c ⊔ (b ⊔ c) := by
rw [sup_sup_sup_comm, sup_idem]
theorem sup_congr_left (hb : b ≤ a ⊔ c) (hc : c ≤ a ⊔ b) : a ⊔ b = a ⊔ c :=
(sup_le le_sup_left hb).antisymm <| sup_le le_sup_left hc
theorem sup_congr_right (ha : a ≤ b ⊔ c) (hb : b ≤ a ⊔ c) : a ⊔ c = b ⊔ c :=
(sup_le ha le_sup_right).antisymm <| sup_le hb le_sup_right
theorem sup_eq_sup_iff_left : a ⊔ b = a ⊔ c ↔ b ≤ a ⊔ c ∧ c ≤ a ⊔ b :=
⟨fun h => ⟨h ▸ le_sup_right, h.symm ▸ le_sup_right⟩, fun h => sup_congr_left h.1 h.2⟩
theorem sup_eq_sup_iff_right : a ⊔ c = b ⊔ c ↔ a ≤ b ⊔ c ∧ b ≤ a ⊔ c :=
⟨fun h => ⟨h ▸ le_sup_left, h.symm ▸ le_sup_left⟩, fun h => sup_congr_right h.1 h.2⟩
theorem Ne.lt_sup_or_lt_sup (hab : a ≠ b) : a < a ⊔ b ∨ b < a ⊔ b :=
hab.symm.not_le_or_not_le.imp left_lt_sup.2 right_lt_sup.2
/-- If `f` is monotone, `g` is antitone, and `f ≤ g`, then for all `a`, `b` we have `f a ≤ g b`. -/
theorem Monotone.forall_le_of_antitone {β : Type*} [Preorder β] {f g : α → β} (hf : Monotone f)
(hg : Antitone g) (h : f ≤ g) (m n : α) : f m ≤ g n :=
calc
f m ≤ f (m ⊔ n) := hf le_sup_left
_ ≤ g (m ⊔ n) := h _
_ ≤ g n := hg le_sup_right
theorem SemilatticeSup.ext_sup {α} {A B : SemilatticeSup α}
(H : ∀ x y : α, (haveI := A; x ≤ y) ↔ x ≤ y)
(x y : α) :
(haveI := A; x ⊔ y) = x ⊔ y :=
eq_of_forall_ge_iff fun c => by simp only [sup_le_iff]; rw [← H, @sup_le_iff α A, H, H]
theorem SemilatticeSup.ext {α} {A B : SemilatticeSup α}
(H : ∀ x y : α, (haveI := A; x ≤ y) ↔ x ≤ y) :
A = B := by
cases A
cases B
cases PartialOrder.ext H
congr
ext; apply SemilatticeSup.ext_sup H
theorem ite_le_sup (s s' : α) (P : Prop) [Decidable P] : ite P s s' ≤ s ⊔ s' :=
if h : P then (if_pos h).trans_le le_sup_left else (if_neg h).trans_le le_sup_right
end SemilatticeSup
/-!
### Meet-semilattices
-/
/-- A `SemilatticeInf` is a meet-semilattice, that is, a partial order
with a meet (a.k.a. glb / greatest lower bound, inf / infimum) operation
`⊓` which is the greatest element smaller than both factors. -/
class SemilatticeInf (α : Type u) extends PartialOrder α where
/-- The binary infimum, used to derive `Min α` -/
inf : α → α → α
/-- The infimum is a lower bound on the first argument -/
protected inf_le_left : ∀ a b : α, inf a b ≤ a
/-- The infimum is a lower bound on the second argument -/
protected inf_le_right : ∀ a b : α, inf a b ≤ b
/-- The infimum is the *greatest* lower bound -/
protected le_inf : ∀ a b c : α, a ≤ b → a ≤ c → a ≤ inf b c
instance SemilatticeInf.toMin [SemilatticeInf α] : Min α where min a b := SemilatticeInf.inf a b
instance OrderDual.instSemilatticeSup (α) [SemilatticeInf α] : SemilatticeSup αᵒᵈ where
sup := @SemilatticeInf.inf α _
le_sup_left := @SemilatticeInf.inf_le_left α _
le_sup_right := @SemilatticeInf.inf_le_right α _
sup_le := fun _ _ _ hca hcb => @SemilatticeInf.le_inf α _ _ _ _ hca hcb
instance OrderDual.instSemilatticeInf (α) [SemilatticeSup α] : SemilatticeInf αᵒᵈ where
inf := @SemilatticeSup.sup α _
inf_le_left := @le_sup_left α _
inf_le_right := @le_sup_right α _
le_inf := fun _ _ _ hca hcb => @sup_le α _ _ _ _ hca hcb
theorem SemilatticeSup.dual_dual (α : Type*) [H : SemilatticeSup α] :
OrderDual.instSemilatticeSup αᵒᵈ = H :=
SemilatticeSup.ext fun _ _ => Iff.rfl
section SemilatticeInf
variable [SemilatticeInf α] {a b c d : α}
@[simp]
theorem inf_le_left : a ⊓ b ≤ a :=
SemilatticeInf.inf_le_left a b
@[simp]
theorem inf_le_right : a ⊓ b ≤ b :=
SemilatticeInf.inf_le_right a b
theorem le_inf : a ≤ b → a ≤ c → a ≤ b ⊓ c :=
SemilatticeInf.le_inf a b c
theorem inf_le_of_left_le (h : a ≤ c) : a ⊓ b ≤ c :=
le_trans inf_le_left h
theorem inf_le_of_right_le (h : b ≤ c) : a ⊓ b ≤ c :=
le_trans inf_le_right h
theorem inf_lt_of_left_lt (h : a < c) : a ⊓ b < c :=
lt_of_le_of_lt inf_le_left h
theorem inf_lt_of_right_lt (h : b < c) : a ⊓ b < c :=
lt_of_le_of_lt inf_le_right h
@[simp]
theorem le_inf_iff : a ≤ b ⊓ c ↔ a ≤ b ∧ a ≤ c :=
@sup_le_iff αᵒᵈ _ _ _ _
@[simp]
theorem inf_eq_left : a ⊓ b = a ↔ a ≤ b :=
le_antisymm_iff.trans <| by simp [le_rfl]
@[simp]
theorem inf_eq_right : a ⊓ b = b ↔ b ≤ a :=
le_antisymm_iff.trans <| by simp [le_rfl]
@[simp]
theorem left_eq_inf : a = a ⊓ b ↔ a ≤ b :=
eq_comm.trans inf_eq_left
@[simp]
theorem right_eq_inf : b = a ⊓ b ↔ b ≤ a :=
eq_comm.trans inf_eq_right
alias ⟨le_of_inf_eq, inf_of_le_left⟩ := inf_eq_left
alias ⟨_, inf_of_le_right⟩ := inf_eq_right
attribute [simp] inf_of_le_left inf_of_le_right
@[simp]
theorem inf_lt_left : a ⊓ b < a ↔ ¬a ≤ b :=
@left_lt_sup αᵒᵈ _ _ _
@[simp]
theorem inf_lt_right : a ⊓ b < b ↔ ¬b ≤ a :=
@right_lt_sup αᵒᵈ _ _ _
theorem inf_lt_left_or_right (h : a ≠ b) : a ⊓ b < a ∨ a ⊓ b < b :=
@left_or_right_lt_sup αᵒᵈ _ _ _ h
@[gcongr]
theorem inf_le_inf (h₁ : a ≤ b) (h₂ : c ≤ d) : a ⊓ c ≤ b ⊓ d :=
@sup_le_sup αᵒᵈ _ _ _ _ _ h₁ h₂
@[gcongr]
theorem inf_le_inf_right (a : α) {b c : α} (h : b ≤ c) : b ⊓ a ≤ c ⊓ a :=
inf_le_inf h le_rfl
@[gcongr]
theorem inf_le_inf_left (a : α) {b c : α} (h : b ≤ c) : a ⊓ b ≤ a ⊓ c :=
inf_le_inf le_rfl h
theorem inf_idem (a : α) : a ⊓ a = a := by simp
instance : Std.IdempotentOp (α := α) (· ⊓ ·) := ⟨inf_idem⟩
theorem inf_comm (a b : α) : a ⊓ b = b ⊓ a := @sup_comm αᵒᵈ _ _ _
instance : Std.Commutative (α := α) (· ⊓ ·) := ⟨inf_comm⟩
theorem inf_assoc (a b c : α) : a ⊓ b ⊓ c = a ⊓ (b ⊓ c) := @sup_assoc αᵒᵈ _ _ _ _
instance : Std.Associative (α := α) (· ⊓ ·) := ⟨inf_assoc⟩
theorem inf_left_right_swap (a b c : α) : a ⊓ b ⊓ c = c ⊓ b ⊓ a :=
@sup_left_right_swap αᵒᵈ _ _ _ _
theorem inf_left_idem (a b : α) : a ⊓ (a ⊓ b) = a ⊓ b := by simp
theorem inf_right_idem (a b : α) : a ⊓ b ⊓ b = a ⊓ b := by simp
theorem inf_left_comm (a b c : α) : a ⊓ (b ⊓ c) = b ⊓ (a ⊓ c) :=
@sup_left_comm αᵒᵈ _ a b c
theorem inf_right_comm (a b c : α) : a ⊓ b ⊓ c = a ⊓ c ⊓ b :=
@sup_right_comm αᵒᵈ _ a b c
theorem inf_inf_inf_comm (a b c d : α) : a ⊓ b ⊓ (c ⊓ d) = a ⊓ c ⊓ (b ⊓ d) :=
@sup_sup_sup_comm αᵒᵈ _ _ _ _ _
theorem inf_inf_distrib_left (a b c : α) : a ⊓ (b ⊓ c) = a ⊓ b ⊓ (a ⊓ c) :=
@sup_sup_distrib_left αᵒᵈ _ _ _ _
theorem inf_inf_distrib_right (a b c : α) : a ⊓ b ⊓ c = a ⊓ c ⊓ (b ⊓ c) :=
@sup_sup_distrib_right αᵒᵈ _ _ _ _
theorem inf_congr_left (hb : a ⊓ c ≤ b) (hc : a ⊓ b ≤ c) : a ⊓ b = a ⊓ c :=
@sup_congr_left αᵒᵈ _ _ _ _ hb hc
theorem inf_congr_right (h1 : b ⊓ c ≤ a) (h2 : a ⊓ c ≤ b) : a ⊓ c = b ⊓ c :=
@sup_congr_right αᵒᵈ _ _ _ _ h1 h2
theorem inf_eq_inf_iff_left : a ⊓ b = a ⊓ c ↔ a ⊓ c ≤ b ∧ a ⊓ b ≤ c :=
@sup_eq_sup_iff_left αᵒᵈ _ _ _ _
theorem inf_eq_inf_iff_right : a ⊓ c = b ⊓ c ↔ b ⊓ c ≤ a ∧ a ⊓ c ≤ b :=
@sup_eq_sup_iff_right αᵒᵈ _ _ _ _
theorem Ne.inf_lt_or_inf_lt : a ≠ b → a ⊓ b < a ∨ a ⊓ b < b :=
@Ne.lt_sup_or_lt_sup αᵒᵈ _ _ _
theorem SemilatticeInf.ext_inf {α} {A B : SemilatticeInf α}
(H : ∀ x y : α, (haveI := A; x ≤ y) ↔ x ≤ y)
(x y : α) :
(haveI := A; x ⊓ y) = x ⊓ y :=
eq_of_forall_le_iff fun c => by simp only [le_inf_iff]; rw [← H, @le_inf_iff α A, H, H]
theorem SemilatticeInf.ext {α} {A B : SemilatticeInf α}
(H : ∀ x y : α, (haveI := A; x ≤ y) ↔ x ≤ y) :
A = B := by
cases A
cases B
cases PartialOrder.ext H
congr
ext; apply SemilatticeInf.ext_inf H
theorem SemilatticeInf.dual_dual (α : Type*) [H : SemilatticeInf α] :
OrderDual.instSemilatticeInf αᵒᵈ = H :=
SemilatticeInf.ext fun _ _ => Iff.rfl
theorem inf_le_ite (s s' : α) (P : Prop) [Decidable P] : s ⊓ s' ≤ ite P s s' :=
@ite_le_sup αᵒᵈ _ _ _ _ _
end SemilatticeInf
/--
A type with a commutative, associative and idempotent binary `inf` operation has the structure of a
meet-semilattice.
The partial order is defined so that `a ≤ b` unfolds to `b ⊓ a = a`; cf. `inf_eq_right`.
-/
def SemilatticeInf.mk' {α : Type*} [Min α] (inf_comm : ∀ a b : α, a ⊓ b = b ⊓ a)
(inf_assoc : ∀ a b c : α, a ⊓ b ⊓ c = a ⊓ (b ⊓ c)) (inf_idem : ∀ a : α, a ⊓ a = a) :
SemilatticeInf α := by
haveI : SemilatticeSup αᵒᵈ := SemilatticeSup.mk' inf_comm inf_assoc inf_idem
haveI i := OrderDual.instSemilatticeInf αᵒᵈ
exact i
/-!
### Lattices
-/
/-- A lattice is a join-semilattice which is also a meet-semilattice. -/
class Lattice (α : Type u) extends SemilatticeSup α, SemilatticeInf α
instance OrderDual.instLattice (α) [Lattice α] : Lattice αᵒᵈ where
/-- The partial orders from `SemilatticeSup_mk'` and `SemilatticeInf_mk'` agree
if `sup` and `inf` satisfy the lattice absorption laws `sup_inf_self` (`a ⊔ a ⊓ b = a`)
and `inf_sup_self` (`a ⊓ (a ⊔ b) = a`). -/
theorem semilatticeSup_mk'_partialOrder_eq_semilatticeInf_mk'_partialOrder
{α : Type*} [Max α] [Min α]
(sup_comm : ∀ a b : α, a ⊔ b = b ⊔ a) (sup_assoc : ∀ a b c : α, a ⊔ b ⊔ c = a ⊔ (b ⊔ c))
(sup_idem : ∀ a : α, a ⊔ a = a) (inf_comm : ∀ a b : α, a ⊓ b = b ⊓ a)
(inf_assoc : ∀ a b c : α, a ⊓ b ⊓ c = a ⊓ (b ⊓ c)) (inf_idem : ∀ a : α, a ⊓ a = a)
(sup_inf_self : ∀ a b : α, a ⊔ a ⊓ b = a) (inf_sup_self : ∀ a b : α, a ⊓ (a ⊔ b) = a) :
@SemilatticeSup.toPartialOrder _ (SemilatticeSup.mk' sup_comm sup_assoc sup_idem) =
@SemilatticeInf.toPartialOrder _ (SemilatticeInf.mk' inf_comm inf_assoc inf_idem) :=
PartialOrder.ext fun a b =>
show a ⊔ b = b ↔ b ⊓ a = a from
⟨fun h => by rw [← h, inf_comm, inf_sup_self], fun h => by rw [← h, sup_comm, sup_inf_self]⟩
/-- A type with a pair of commutative and associative binary operations which satisfy two absorption
laws relating the two operations has the structure of a lattice.
The partial order is defined so that `a ≤ b` unfolds to `a ⊔ b = b`; cf. `sup_eq_right`.
-/
def Lattice.mk' {α : Type*} [Max α] [Min α] (sup_comm : ∀ a b : α, a ⊔ b = b ⊔ a)
(sup_assoc : ∀ a b c : α, a ⊔ b ⊔ c = a ⊔ (b ⊔ c)) (inf_comm : ∀ a b : α, a ⊓ b = b ⊓ a)
(inf_assoc : ∀ a b c : α, a ⊓ b ⊓ c = a ⊓ (b ⊓ c)) (sup_inf_self : ∀ a b : α, a ⊔ a ⊓ b = a)
(inf_sup_self : ∀ a b : α, a ⊓ (a ⊔ b) = a) : Lattice α :=
have sup_idem : ∀ b : α, b ⊔ b = b := fun b =>
calc
b ⊔ b = b ⊔ b ⊓ (b ⊔ b) := by rw [inf_sup_self]
_ = b := by rw [sup_inf_self]
have inf_idem : ∀ b : α, b ⊓ b = b := fun b =>
calc
b ⊓ b = b ⊓ (b ⊔ b ⊓ b) := by rw [sup_inf_self]
_ = b := by rw [inf_sup_self]
let semilatt_inf_inst := SemilatticeInf.mk' inf_comm inf_assoc inf_idem
let semilatt_sup_inst := SemilatticeSup.mk' sup_comm sup_assoc sup_idem
have partial_order_eq : @SemilatticeSup.toPartialOrder _ semilatt_sup_inst =
@SemilatticeInf.toPartialOrder _ semilatt_inf_inst :=
semilatticeSup_mk'_partialOrder_eq_semilatticeInf_mk'_partialOrder _ _ _ _ _ _
sup_inf_self inf_sup_self
{ semilatt_sup_inst, semilatt_inf_inst with
inf_le_left := fun a b => by
rw [partial_order_eq]
apply inf_le_left,
inf_le_right := fun a b => by
rw [partial_order_eq]
apply inf_le_right,
le_inf := fun a b c => by
rw [partial_order_eq]
apply le_inf }
section Lattice
variable [Lattice α] {a b c : α}
theorem inf_le_sup : a ⊓ b ≤ a ⊔ b :=
inf_le_left.trans le_sup_left
theorem sup_le_inf : a ⊔ b ≤ a ⊓ b ↔ a = b := by simp [le_antisymm_iff, and_comm]
@[simp] lemma inf_eq_sup : a ⊓ b = a ⊔ b ↔ a = b := by rw [← inf_le_sup.ge_iff_eq, sup_le_inf]
@[simp] lemma sup_eq_inf : a ⊔ b = a ⊓ b ↔ a = b := eq_comm.trans inf_eq_sup
@[simp] lemma inf_lt_sup : a ⊓ b < a ⊔ b ↔ a ≠ b := by rw [inf_le_sup.lt_iff_ne, Ne, inf_eq_sup]
lemma inf_eq_and_sup_eq_iff : a ⊓ b = c ∧ a ⊔ b = c ↔ a = c ∧ b = c := by
refine ⟨fun h ↦ ?_, ?_⟩
· obtain rfl := sup_eq_inf.1 (h.2.trans h.1.symm)
simpa using h
· rintro ⟨rfl, rfl⟩
exact ⟨inf_idem _, sup_idem _⟩
/-!
#### Distributivity laws
-/
-- TODO: better names?
theorem sup_inf_le : a ⊔ b ⊓ c ≤ (a ⊔ b) ⊓ (a ⊔ c) :=
le_inf (sup_le_sup_left inf_le_left _) (sup_le_sup_left inf_le_right _)
theorem le_inf_sup : a ⊓ b ⊔ a ⊓ c ≤ a ⊓ (b ⊔ c) :=
sup_le (inf_le_inf_left _ le_sup_left) (inf_le_inf_left _ le_sup_right)
theorem inf_sup_self : a ⊓ (a ⊔ b) = a := by simp
theorem sup_inf_self : a ⊔ a ⊓ b = a := by simp
theorem sup_eq_iff_inf_eq : a ⊔ b = b ↔ a ⊓ b = a := by rw [sup_eq_right, ← inf_eq_left]
theorem Lattice.ext {α} {A B : Lattice α} (H : ∀ x y : α, (haveI := A; x ≤ y) ↔ x ≤ y) :
A = B := by
cases A
cases B
cases SemilatticeSup.ext H
cases SemilatticeInf.ext H
congr
end Lattice
/-!
### Distributive lattices
-/
/-- A distributive lattice is a lattice that satisfies any of four
equivalent distributive properties (of `sup` over `inf` or `inf` over `sup`,
on the left or right).
The definition here chooses `le_sup_inf`: `(x ⊔ y) ⊓ (x ⊔ z) ≤ x ⊔ (y ⊓ z)`. To prove distributivity
from the dual law, use `DistribLattice.of_inf_sup_le`.
A classic example of a distributive lattice
is the lattice of subsets of a set, and in fact this example is
generic in the sense that every distributive lattice is realizable
as a sublattice of a powerset lattice. -/
class DistribLattice (α) extends Lattice α where
/-- The infimum distributes over the supremum -/
protected le_sup_inf : ∀ x y z : α, (x ⊔ y) ⊓ (x ⊔ z) ≤ x ⊔ y ⊓ z
section DistribLattice
variable [DistribLattice α] {x y z : α}
theorem le_sup_inf : ∀ {x y z : α}, (x ⊔ y) ⊓ (x ⊔ z) ≤ x ⊔ y ⊓ z :=
fun {x y z} => DistribLattice.le_sup_inf x y z
theorem sup_inf_left (a b c : α) : a ⊔ b ⊓ c = (a ⊔ b) ⊓ (a ⊔ c) :=
le_antisymm sup_inf_le le_sup_inf
theorem sup_inf_right (a b c : α) : a ⊓ b ⊔ c = (a ⊔ c) ⊓ (b ⊔ c) := by
simp only [sup_inf_left, sup_comm _ c, eq_self_iff_true]
theorem inf_sup_left (a b c : α) : a ⊓ (b ⊔ c) = a ⊓ b ⊔ a ⊓ c :=
calc
a ⊓ (b ⊔ c) = a ⊓ (a ⊔ c) ⊓ (b ⊔ c) := by rw [inf_sup_self]
_ = a ⊓ (a ⊓ b ⊔ c) := by simp only [inf_assoc, sup_inf_right, eq_self_iff_true]
_ = (a ⊔ a ⊓ b) ⊓ (a ⊓ b ⊔ c) := by rw [sup_inf_self]
_ = (a ⊓ b ⊔ a) ⊓ (a ⊓ b ⊔ c) := by rw [sup_comm]
_ = a ⊓ b ⊔ a ⊓ c := by rw [sup_inf_left]
instance OrderDual.instDistribLattice (α : Type*) [DistribLattice α] : DistribLattice αᵒᵈ where
le_sup_inf _ _ _ := (inf_sup_left _ _ _).le
theorem inf_sup_right (a b c : α) : (a ⊔ b) ⊓ c = a ⊓ c ⊔ b ⊓ c := by
simp only [inf_sup_left, inf_comm _ c, eq_self_iff_true]
theorem le_of_inf_le_sup_le (h₁ : x ⊓ z ≤ y ⊓ z) (h₂ : x ⊔ z ≤ y ⊔ z) : x ≤ y :=
calc
x ≤ y ⊓ z ⊔ x := le_sup_right
_ = (y ⊔ x) ⊓ (x ⊔ z) := by rw [sup_inf_right, sup_comm x]
_ ≤ (y ⊔ x) ⊓ (y ⊔ z) := inf_le_inf_left _ h₂
_ = y ⊔ x ⊓ z := by rw [← sup_inf_left]
_ ≤ y ⊔ y ⊓ z := sup_le_sup_left h₁ _
_ ≤ _ := sup_le (le_refl y) inf_le_left
theorem eq_of_inf_eq_sup_eq {a b c : α} (h₁ : b ⊓ a = c ⊓ a) (h₂ : b ⊔ a = c ⊔ a) : b = c :=
le_antisymm (le_of_inf_le_sup_le (le_of_eq h₁) (le_of_eq h₂))
(le_of_inf_le_sup_le (le_of_eq h₁.symm) (le_of_eq h₂.symm))
end DistribLattice
-- See note [reducible non-instances]
/-- Prove distributivity of an existing lattice from the dual distributive law. -/
abbrev DistribLattice.ofInfSupLe
[Lattice α] (inf_sup_le : ∀ a b c : α, a ⊓ (b ⊔ c) ≤ a ⊓ b ⊔ a ⊓ c) : DistribLattice α where
le_sup_inf := (@OrderDual.instDistribLattice αᵒᵈ {inferInstanceAs (Lattice αᵒᵈ) with
le_sup_inf := inf_sup_le}).le_sup_inf
/-!
### Lattices derived from linear orders
-/
-- see Note [lower instance priority]
instance (priority := 100) LinearOrder.toLattice {α : Type u} [LinearOrder α] : Lattice α where
sup := max
inf := min
le_sup_left := le_max_left; le_sup_right := le_max_right; sup_le _ _ _ := max_le
inf_le_left := min_le_left; inf_le_right := min_le_right; le_inf _ _ _ := le_min
section LinearOrder
variable [LinearOrder α] {a b c d : α}
@[deprecated "is syntactical" (since := "2024-11-13"), nolint synTaut]
theorem sup_eq_max : a ⊔ b = max a b :=
rfl
@[deprecated "is syntactical" (since := "2024-11-13"), nolint synTaut]
theorem inf_eq_min : a ⊓ b = min a b :=
rfl
theorem sup_ind (a b : α) {p : α → Prop} (ha : p a) (hb : p b) : p (a ⊔ b) :=
(IsTotal.total a b).elim (fun h : a ≤ b => by rwa [sup_eq_right.2 h]) fun h => by
rwa [sup_eq_left.2 h]
@[simp]
theorem le_sup_iff : a ≤ b ⊔ c ↔ a ≤ b ∨ a ≤ c := by
exact ⟨fun h =>
(le_total c b).imp
(fun bc => by rwa [sup_eq_left.2 bc] at h)
(fun bc => by rwa [sup_eq_right.2 bc] at h),
fun h => h.elim le_sup_of_le_left le_sup_of_le_right⟩
@[simp]
theorem lt_sup_iff : a < b ⊔ c ↔ a < b ∨ a < c := by
exact ⟨fun h =>
(le_total c b).imp
(fun bc => by rwa [sup_eq_left.2 bc] at h)
(fun bc => by rwa [sup_eq_right.2 bc] at h),
fun h => h.elim lt_sup_of_lt_left lt_sup_of_lt_right⟩
@[simp]
theorem sup_lt_iff : b ⊔ c < a ↔ b < a ∧ c < a :=
⟨fun h => ⟨le_sup_left.trans_lt h, le_sup_right.trans_lt h⟩,
fun h => sup_ind (p := (· < a)) b c h.1 h.2⟩
theorem inf_ind (a b : α) {p : α → Prop} : p a → p b → p (a ⊓ b) :=
@sup_ind αᵒᵈ _ _ _ _
@[simp]
theorem inf_le_iff : b ⊓ c ≤ a ↔ b ≤ a ∨ c ≤ a :=
@le_sup_iff αᵒᵈ _ _ _ _
@[simp]
theorem inf_lt_iff : b ⊓ c < a ↔ b < a ∨ c < a :=
@lt_sup_iff αᵒᵈ _ _ _ _
@[simp]
theorem lt_inf_iff : a < b ⊓ c ↔ a < b ∧ a < c :=
@sup_lt_iff αᵒᵈ _ _ _ _
variable (a b c d)
theorem max_max_max_comm : max (max a b) (max c d) = max (max a c) (max b d) :=
sup_sup_sup_comm _ _ _ _
theorem min_min_min_comm : min (min a b) (min c d) = min (min a c) (min b d) :=
inf_inf_inf_comm _ _ _ _
end LinearOrder
theorem sup_eq_maxDefault [SemilatticeSup α] [DecidableLE α] [IsTotal α (· ≤ ·)] :
(· ⊔ ·) = (maxDefault : α → α → α) := by
ext x y
unfold maxDefault
split_ifs with h'
exacts [sup_of_le_right h', sup_of_le_left <| (total_of (· ≤ ·) x y).resolve_left h']
theorem inf_eq_minDefault [SemilatticeInf α] [DecidableLE α] [IsTotal α (· ≤ ·)] :
(· ⊓ ·) = (minDefault : α → α → α) := by
ext x y
unfold minDefault
split_ifs with h'
exacts [inf_of_le_left h', inf_of_le_right <| (total_of (· ≤ ·) x y).resolve_left h']
/-- A lattice with total order is a linear order.
See note [reducible non-instances]. -/
abbrev Lattice.toLinearOrder (α : Type u) [Lattice α] [DecidableEq α]
[DecidableLE α] [DecidableLT α] [IsTotal α (· ≤ ·)] : LinearOrder α where
toDecidableLE := ‹_›
toDecidableEq := ‹_›
toDecidableLT := ‹_›
le_total := total_of (· ≤ ·)
max_def := by exact congr_fun₂ sup_eq_maxDefault
min_def := by exact congr_fun₂ inf_eq_minDefault
-- see Note [lower instance priority]
instance (priority := 100) {α : Type u} [LinearOrder α] : DistribLattice α where
le_sup_inf _ b c :=
match le_total b c with
| Or.inl h => inf_le_of_left_le <| sup_le_sup_left (le_inf (le_refl b) h) _
| Or.inr h => inf_le_of_right_le <| sup_le_sup_left (le_inf h (le_refl c)) _
instance : DistribLattice ℕ := inferInstance
instance : Lattice ℤ := inferInstance
/-! ### Dual order -/
open OrderDual
@[simp]
theorem ofDual_inf [Max α] (a b : αᵒᵈ) : ofDual (a ⊓ b) = ofDual a ⊔ ofDual b :=
rfl
@[simp]
theorem ofDual_sup [Min α] (a b : αᵒᵈ) : ofDual (a ⊔ b) = ofDual a ⊓ ofDual b :=
rfl
@[simp]
theorem toDual_inf [Min α] (a b : α) : toDual (a ⊓ b) = toDual a ⊔ toDual b :=
rfl
@[simp]
theorem toDual_sup [Max α] (a b : α) : toDual (a ⊔ b) = toDual a ⊓ toDual b :=
rfl
section LinearOrder
variable [LinearOrder α]
@[simp]
theorem ofDual_min (a b : αᵒᵈ) : ofDual (min a b) = max (ofDual a) (ofDual b) :=
rfl
@[simp]
theorem ofDual_max (a b : αᵒᵈ) : ofDual (max a b) = min (ofDual a) (ofDual b) :=
rfl
@[simp]
theorem toDual_min (a b : α) : toDual (min a b) = max (toDual a) (toDual b) :=
rfl
@[simp]
theorem toDual_max (a b : α) : toDual (max a b) = min (toDual a) (toDual b) :=
rfl
end LinearOrder
/-! ### Function lattices -/
namespace Pi
variable {ι : Type*} {α' : ι → Type*}
instance [∀ i, Max (α' i)] : Max (∀ i, α' i) :=
⟨fun f g i => f i ⊔ g i⟩
@[simp]
theorem sup_apply [∀ i, Max (α' i)] (f g : ∀ i, α' i) (i : ι) : (f ⊔ g) i = f i ⊔ g i :=
rfl
theorem sup_def [∀ i, Max (α' i)] (f g : ∀ i, α' i) : f ⊔ g = fun i => f i ⊔ g i :=
rfl
instance [∀ i, Min (α' i)] : Min (∀ i, α' i) :=
⟨fun f g i => f i ⊓ g i⟩
@[simp]
theorem inf_apply [∀ i, Min (α' i)] (f g : ∀ i, α' i) (i : ι) : (f ⊓ g) i = f i ⊓ g i :=
rfl
theorem inf_def [∀ i, Min (α' i)] (f g : ∀ i, α' i) : f ⊓ g = fun i => f i ⊓ g i :=
rfl
instance instSemilatticeSup [∀ i, SemilatticeSup (α' i)] : SemilatticeSup (∀ i, α' i) where
sup x y i := x i ⊔ y i
le_sup_left _ _ _ := le_sup_left
le_sup_right _ _ _ := le_sup_right
sup_le _ _ _ ac bc i := sup_le (ac i) (bc i)
instance instSemilatticeInf [∀ i, SemilatticeInf (α' i)] : SemilatticeInf (∀ i, α' i) where
inf x y i := x i ⊓ y i
inf_le_left _ _ _ := inf_le_left
inf_le_right _ _ _ := inf_le_right
le_inf _ _ _ ac bc i := le_inf (ac i) (bc i)
instance instLattice [∀ i, Lattice (α' i)] : Lattice (∀ i, α' i) where
instance instDistribLattice [∀ i, DistribLattice (α' i)] : DistribLattice (∀ i, α' i) where
le_sup_inf _ _ _ _ := le_sup_inf
end Pi
namespace Function
variable {ι : Type*} {π : ι → Type*} [DecidableEq ι]
-- Porting note: Dot notation on `Function.update` broke
theorem update_sup [∀ i, SemilatticeSup (π i)] (f : ∀ i, π i) (i : ι) (a b : π i) :
update f i (a ⊔ b) = update f i a ⊔ update f i b :=
funext fun j => by obtain rfl | hji := eq_or_ne j i <;> simp [update_of_ne, *]
theorem update_inf [∀ i, SemilatticeInf (π i)] (f : ∀ i, π i) (i : ι) (a b : π i) :
update f i (a ⊓ b) = update f i a ⊓ update f i b :=
funext fun j => by obtain rfl | hji := eq_or_ne j i <;> simp [update_of_ne, *]
end Function
/-!
### Monotone functions and lattices
-/
namespace Monotone
/-- Pointwise supremum of two monotone functions is a monotone function. -/
protected theorem sup [Preorder α] [SemilatticeSup β] {f g : α → β} (hf : Monotone f)
(hg : Monotone g) :
Monotone (f ⊔ g) := fun _ _ h => sup_le_sup (hf h) (hg h)
/-- Pointwise infimum of two monotone functions is a monotone function. -/
protected theorem inf [Preorder α] [SemilatticeInf β] {f g : α → β} (hf : Monotone f)
(hg : Monotone g) :
Monotone (f ⊓ g) := fun _ _ h => inf_le_inf (hf h) (hg h)
/-- Pointwise maximum of two monotone functions is a monotone function. -/
protected theorem max [Preorder α] [LinearOrder β] {f g : α → β} (hf : Monotone f)
(hg : Monotone g) :
Monotone fun x => max (f x) (g x) :=
hf.sup hg
/-- Pointwise minimum of two monotone functions is a monotone function. -/
protected theorem min [Preorder α] [LinearOrder β] {f g : α → β} (hf : Monotone f)
(hg : Monotone g) :
Monotone fun x => min (f x) (g x) :=
hf.inf hg
theorem le_map_sup [SemilatticeSup α] [SemilatticeSup β] {f : α → β} (h : Monotone f) (x y : α) :
f x ⊔ f y ≤ f (x ⊔ y) :=
sup_le (h le_sup_left) (h le_sup_right)
theorem map_inf_le [SemilatticeInf α] [SemilatticeInf β] {f : α → β} (h : Monotone f) (x y : α) :
f (x ⊓ y) ≤ f x ⊓ f y :=
le_inf (h inf_le_left) (h inf_le_right)
theorem of_map_inf_le_left [SemilatticeInf α] [Preorder β] {f : α → β}
(h : ∀ x y, f (x ⊓ y) ≤ f x) : Monotone f := by
intro x y hxy
rw [← inf_eq_right.2 hxy]
apply h
theorem of_map_inf_le [SemilatticeInf α] [SemilatticeInf β] {f : α → β}
(h : ∀ x y, f (x ⊓ y) ≤ f x ⊓ f y) : Monotone f :=
of_map_inf_le_left fun x y ↦ (h x y).trans inf_le_left
theorem of_map_inf [SemilatticeInf α] [SemilatticeInf β] {f : α → β}
(h : ∀ x y, f (x ⊓ y) = f x ⊓ f y) : Monotone f :=
of_map_inf_le fun x y ↦ (h x y).le
theorem of_left_le_map_sup [SemilatticeSup α] [Preorder β] {f : α → β}
(h : ∀ x y, f x ≤ f (x ⊔ y)) : Monotone f :=
monotone_dual_iff.1 <| of_map_inf_le_left h
theorem of_le_map_sup [SemilatticeSup α] [SemilatticeSup β] {f : α → β}
(h : ∀ x y, f x ⊔ f y ≤ f (x ⊔ y)) : Monotone f :=
monotone_dual_iff.mp <| of_map_inf_le h
theorem of_map_sup [SemilatticeSup α] [SemilatticeSup β] {f : α → β}
(h : ∀ x y, f (x ⊔ y) = f x ⊔ f y) : Monotone f :=
(@of_map_inf (OrderDual α) (OrderDual β) _ _ _ h).dual
variable [LinearOrder α]
theorem map_sup [SemilatticeSup β] {f : α → β} (hf : Monotone f) (x y : α) :
f (x ⊔ y) = f x ⊔ f y :=
(IsTotal.total x y).elim (fun h : x ≤ y => by simp only [h, hf h, sup_of_le_right]) fun h => by
simp only [h, hf h, sup_of_le_left]
theorem map_inf [SemilatticeInf β] {f : α → β} (hf : Monotone f) (x y : α) :
f (x ⊓ y) = f x ⊓ f y :=
hf.dual.map_sup _ _
end Monotone
namespace MonotoneOn
variable {f : α → β} {s : Set α} {x y : α}
/-- Pointwise supremum of two monotone functions is a monotone function. -/
protected theorem sup [Preorder α] [SemilatticeSup β] {f g : α → β} {s : Set α}
(hf : MonotoneOn f s) (hg : MonotoneOn g s) : MonotoneOn (f ⊔ g) s :=
fun _ hx _ hy h => sup_le_sup (hf hx hy h) (hg hx hy h)
/-- Pointwise infimum of two monotone functions is a monotone function. -/
protected theorem inf [Preorder α] [SemilatticeInf β] {f g : α → β} {s : Set α}
(hf : MonotoneOn f s) (hg : MonotoneOn g s) : MonotoneOn (f ⊓ g) s :=
(hf.dual.sup hg.dual).dual
/-- Pointwise maximum of two monotone functions is a monotone function. -/
protected theorem max [Preorder α] [LinearOrder β] {f g : α → β} {s : Set α} (hf : MonotoneOn f s)
(hg : MonotoneOn g s) : MonotoneOn (fun x => max (f x) (g x)) s :=
hf.sup hg
/-- Pointwise minimum of two monotone functions is a monotone function. -/
protected theorem min [Preorder α] [LinearOrder β] {f g : α → β} {s : Set α} (hf : MonotoneOn f s)
(hg : MonotoneOn g s) : MonotoneOn (fun x => min (f x) (g x)) s :=
hf.inf hg
theorem of_map_inf [SemilatticeInf α] [SemilatticeInf β]
(h : ∀ x ∈ s, ∀ y ∈ s, f (x ⊓ y) = f x ⊓ f y) : MonotoneOn f s := fun x hx y hy hxy =>
inf_eq_left.1 <| by rw [← h _ hx _ hy, inf_eq_left.2 hxy]
theorem of_map_sup [SemilatticeSup α] [SemilatticeSup β]
(h : ∀ x ∈ s, ∀ y ∈ s, f (x ⊔ y) = f x ⊔ f y) : MonotoneOn f s :=
(@of_map_inf αᵒᵈ βᵒᵈ _ _ _ _ h).dual
variable [LinearOrder α]
theorem map_sup [SemilatticeSup β] (hf : MonotoneOn f s) (hx : x ∈ s) (hy : y ∈ s) :
f (x ⊔ y) = f x ⊔ f y := by
cases le_total x y <;> have := hf ?_ ?_ ‹_› <;>
first
| assumption
| simp only [*, sup_of_le_left, sup_of_le_right]
theorem map_inf [SemilatticeInf β] (hf : MonotoneOn f s) (hx : x ∈ s) (hy : y ∈ s) :
f (x ⊓ y) = f x ⊓ f y :=
hf.dual.map_sup hx hy
end MonotoneOn
namespace Antitone
/-- Pointwise supremum of two monotone functions is a monotone function. -/
protected theorem sup [Preorder α] [SemilatticeSup β] {f g : α → β} (hf : Antitone f)
(hg : Antitone g) :
Antitone (f ⊔ g) := fun _ _ h => sup_le_sup (hf h) (hg h)
/-- Pointwise infimum of two monotone functions is a monotone function. -/
protected theorem inf [Preorder α] [SemilatticeInf β] {f g : α → β} (hf : Antitone f)
(hg : Antitone g) :
Antitone (f ⊓ g) := fun _ _ h => inf_le_inf (hf h) (hg h)
/-- Pointwise maximum of two monotone functions is a monotone function. -/
protected theorem max [Preorder α] [LinearOrder β] {f g : α → β} (hf : Antitone f)
(hg : Antitone g) :
Antitone fun x => max (f x) (g x) :=
hf.sup hg
/-- Pointwise minimum of two monotone functions is a monotone function. -/
protected theorem min [Preorder α] [LinearOrder β] {f g : α → β} (hf : Antitone f)
(hg : Antitone g) :
Antitone fun x => min (f x) (g x) :=
hf.inf hg
theorem map_sup_le [SemilatticeSup α] [SemilatticeInf β] {f : α → β} (h : Antitone f) (x y : α) :
f (x ⊔ y) ≤ f x ⊓ f y :=
h.dual_right.le_map_sup x y
theorem le_map_inf [SemilatticeInf α] [SemilatticeSup β] {f : α → β} (h : Antitone f) (x y : α) :
f x ⊔ f y ≤ f (x ⊓ y) :=
h.dual_right.map_inf_le x y
variable [LinearOrder α]
theorem map_sup [SemilatticeInf β] {f : α → β} (hf : Antitone f) (x y : α) :
f (x ⊔ y) = f x ⊓ f y :=
hf.dual_right.map_sup x y
theorem map_inf [SemilatticeSup β] {f : α → β} (hf : Antitone f) (x y : α) :
| f (x ⊓ y) = f x ⊔ f y :=
hf.dual_right.map_inf x y
| Mathlib/Order/Lattice.lean | 1,010 | 1,012 |
/-
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.LinearAlgebra.BilinearForm.Hom
import Mathlib.LinearAlgebra.Dual.Lemmas
/-!
# Bilinear form
This file defines various properties of bilinear forms, including reflexivity, symmetry,
alternativity, adjoint, and non-degeneracy.
For orthogonality, see `Mathlib/LinearAlgebra/BilinearForm/Orthogonal.lean`.
## 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 {M' : Type*} [AddCommMonoid M'] [Module R M']
variable {B : BilinForm R M} {B₁ : BilinForm R₁ M₁}
namespace LinearMap
namespace BilinForm
/-! ### Reflexivity, symmetry, and alternativity -/
/-- The proposition that a bilinear form is reflexive -/
def IsRefl (B : BilinForm R M) : Prop := LinearMap.IsRefl B
namespace IsRefl
theorem eq_zero (H : B.IsRefl) : ∀ {x y : M}, B x y = 0 → B y x = 0 := fun {x y} => H x y
protected theorem neg {B : BilinForm R₁ M₁} (hB : B.IsRefl) : (-B).IsRefl := fun x y =>
neg_eq_zero.mpr ∘ hB x y ∘ neg_eq_zero.mp
protected theorem smul {α} [Semiring α] [Module α R] [SMulCommClass R α R]
[NoZeroSMulDivisors α R] (a : α) {B : BilinForm R M} (hB : B.IsRefl) :
(a • B).IsRefl := fun _ _ h =>
(smul_eq_zero.mp h).elim (fun ha => smul_eq_zero_of_left ha _) fun hBz =>
smul_eq_zero_of_right _ (hB _ _ hBz)
protected theorem groupSMul {α} [Group α] [DistribMulAction α R] [SMulCommClass R α R] (a : α)
{B : BilinForm R M} (hB : B.IsRefl) : (a • B).IsRefl := fun x y =>
(smul_eq_zero_iff_eq _).mpr ∘ hB x y ∘ (smul_eq_zero_iff_eq _).mp
end IsRefl
@[simp]
theorem isRefl_zero : (0 : BilinForm R M).IsRefl := fun _ _ _ => rfl
@[simp]
theorem isRefl_neg {B : BilinForm R₁ M₁} : (-B).IsRefl ↔ B.IsRefl :=
⟨fun h => neg_neg B ▸ h.neg, IsRefl.neg⟩
/-- The proposition that a bilinear form is symmetric -/
def IsSymm (B : BilinForm R M) : Prop := LinearMap.IsSymm B
namespace IsSymm
protected theorem eq (H : B.IsSymm) (x y : M) : B x y = B y x :=
H x y
theorem isRefl (H : B.IsSymm) : B.IsRefl := fun x y H1 => H x y ▸ H1
protected theorem add {B₁ B₂ : BilinForm R M} (hB₁ : B₁.IsSymm) (hB₂ : B₂.IsSymm) :
(B₁ + B₂).IsSymm := fun x y => (congr_arg₂ (· + ·) (hB₁ x y) (hB₂ x y) :)
protected theorem sub {B₁ B₂ : BilinForm R₁ M₁} (hB₁ : B₁.IsSymm) (hB₂ : B₂.IsSymm) :
(B₁ - B₂).IsSymm := fun x y => (congr_arg₂ Sub.sub (hB₁ x y) (hB₂ x y) :)
protected theorem neg {B : BilinForm R₁ M₁} (hB : B.IsSymm) : (-B).IsSymm := fun x y =>
congr_arg Neg.neg (hB x y)
protected theorem smul {α} [Monoid α] [DistribMulAction α R] [SMulCommClass R α R] (a : α)
{B : BilinForm R M} (hB : B.IsSymm) : (a • B).IsSymm := fun x y =>
congr_arg (a • ·) (hB x y)
/-- The restriction of a symmetric bilinear form on a submodule is also symmetric. -/
theorem restrict {B : BilinForm R M} (b : B.IsSymm) (W : Submodule R M) :
(B.restrict W).IsSymm := fun x y => b x y
end IsSymm
@[simp]
theorem isSymm_zero : (0 : BilinForm R M).IsSymm := fun _ _ => rfl
@[simp]
theorem isSymm_neg {B : BilinForm R₁ M₁} : (-B).IsSymm ↔ B.IsSymm :=
⟨fun h => neg_neg B ▸ h.neg, IsSymm.neg⟩
theorem isSymm_iff_flip : B.IsSymm ↔ flipHom B = B :=
(forall₂_congr fun _ _ => by exact eq_comm).trans BilinForm.ext_iff.symm
/-- The proposition that a bilinear form is alternating -/
def IsAlt (B : BilinForm R M) : Prop := LinearMap.IsAlt B
namespace IsAlt
theorem self_eq_zero (H : B.IsAlt) (x : M) : B x x = 0 := LinearMap.IsAlt.self_eq_zero H x
theorem neg_eq (H : B₁.IsAlt) (x y : M₁) : -B₁ x y = B₁ y x := LinearMap.IsAlt.neg H x y
theorem isRefl (H : B₁.IsAlt) : B₁.IsRefl := LinearMap.IsAlt.isRefl H
theorem eq_of_add_add_eq_zero [IsCancelAdd R] {a b c : M} (H : B.IsAlt) (hAdd : a + b + c = 0) :
B a b = B b c := LinearMap.IsAlt.eq_of_add_add_eq_zero H hAdd
protected theorem add {B₁ B₂ : BilinForm R M} (hB₁ : B₁.IsAlt) (hB₂ : B₂.IsAlt) : (B₁ + B₂).IsAlt :=
fun x => (congr_arg₂ (· + ·) (hB₁ x) (hB₂ x) :).trans <| add_zero _
protected theorem sub {B₁ B₂ : BilinForm R₁ M₁} (hB₁ : B₁.IsAlt) (hB₂ : B₂.IsAlt) :
(B₁ - B₂).IsAlt := fun x => (congr_arg₂ Sub.sub (hB₁ x) (hB₂ x)).trans <| sub_zero _
protected theorem neg {B : BilinForm R₁ M₁} (hB : B.IsAlt) : (-B).IsAlt := fun x =>
neg_eq_zero.mpr <| hB x
protected theorem smul {α} [Monoid α] [DistribMulAction α R] [SMulCommClass R α R] (a : α)
{B : BilinForm R M} (hB : B.IsAlt) : (a • B).IsAlt := fun x =>
(congr_arg (a • ·) (hB x)).trans <| smul_zero _
end IsAlt
@[simp]
theorem isAlt_zero : (0 : BilinForm R M).IsAlt := fun _ => rfl
@[simp]
theorem isAlt_neg {B : BilinForm R₁ M₁} : (-B).IsAlt ↔ B.IsAlt :=
⟨fun h => neg_neg B ▸ h.neg, IsAlt.neg⟩
end BilinForm
namespace BilinForm
/-- A nondegenerate bilinear form is a bilinear form such that the only element that is orthogonal
to every other element is `0`; i.e., for all nonzero `m` in `M`, there exists `n` in `M` with
`B m n ≠ 0`.
Note that for general (neither symmetric nor antisymmetric) bilinear forms this definition has a
chirality; in addition to this "left" nondegeneracy condition one could define a "right"
nondegeneracy condition that in the situation described, `B n m ≠ 0`. This variant definition is
not currently provided in mathlib. In finite dimension either definition implies the other. -/
def Nondegenerate (B : BilinForm R M) : Prop :=
∀ m : M, (∀ n : M, B m n = 0) → m = 0
section
variable (R M)
/-- In a non-trivial module, zero is not non-degenerate. -/
theorem not_nondegenerate_zero [Nontrivial M] : ¬(0 : BilinForm R M).Nondegenerate :=
let ⟨m, hm⟩ := exists_ne (0 : M)
fun h => hm (h m fun _ => rfl)
end
variable {M' : Type*}
variable [AddCommMonoid M'] [Module R M']
theorem Nondegenerate.ne_zero [Nontrivial M] {B : BilinForm R M} (h : B.Nondegenerate) : B ≠ 0 :=
fun h0 => not_nondegenerate_zero R M <| h0 ▸ h
theorem Nondegenerate.congr {B : BilinForm R M} (e : M ≃ₗ[R] M') (h : B.Nondegenerate) :
(congr e B).Nondegenerate := fun m hm =>
e.symm.map_eq_zero_iff.1 <|
h (e.symm m) fun n => (congr_arg _ (e.symm_apply_apply n).symm).trans (hm (e n))
@[simp]
theorem nondegenerate_congr_iff {B : BilinForm R M} (e : M ≃ₗ[R] M') :
(congr e B).Nondegenerate ↔ B.Nondegenerate :=
⟨fun h => by
convert h.congr e.symm
rw [congr_congr, e.self_trans_symm, congr_refl, LinearEquiv.refl_apply], Nondegenerate.congr e⟩
/-- A bilinear form is nondegenerate if and only if it has a trivial kernel. -/
theorem nondegenerate_iff_ker_eq_bot {B : BilinForm R M} :
B.Nondegenerate ↔ LinearMap.ker B = ⊥ := by
rw [LinearMap.ker_eq_bot']
simp [Nondegenerate, LinearMap.ext_iff]
theorem Nondegenerate.ker_eq_bot {B : BilinForm R M} (h : B.Nondegenerate) :
LinearMap.ker B = ⊥ := nondegenerate_iff_ker_eq_bot.mp h
theorem compLeft_injective (B : BilinForm R₁ M₁) (b : B.Nondegenerate) :
Function.Injective B.compLeft := fun φ ψ h => by
ext w
refine eq_of_sub_eq_zero (b _ ?_)
intro v
rw [sub_left, ← compLeft_apply, ← compLeft_apply, ← h, sub_self]
theorem isAdjointPair_unique_of_nondegenerate (B : BilinForm R₁ M₁) (b : B.Nondegenerate)
(φ ψ₁ ψ₂ : M₁ →ₗ[R₁] M₁) (hψ₁ : IsAdjointPair B B ψ₁ φ) (hψ₂ : IsAdjointPair B B ψ₂ φ) :
ψ₁ = ψ₂ :=
B.compLeft_injective b <| ext fun v w => by rw [compLeft_apply, compLeft_apply, hψ₁, hψ₂]
section FiniteDimensional
variable [FiniteDimensional K V]
/-- Given a nondegenerate bilinear form `B` on a finite-dimensional vector space, `B.toDual` is
the linear equivalence between a vector space and its dual. -/
noncomputable def toDual (B : BilinForm K V) (b : B.Nondegenerate) : V ≃ₗ[K] Module.Dual K V :=
B.linearEquivOfInjective (LinearMap.ker_eq_bot.mp <| b.ker_eq_bot)
Subspace.dual_finrank_eq.symm
theorem toDual_def {B : BilinForm K V} (b : B.SeparatingLeft) {m n : V} : B.toDual b m n = B m n :=
rfl
@[simp]
lemma apply_toDual_symm_apply {B : BilinForm K V} {hB : B.Nondegenerate}
(f : Module.Dual K V) (v : V) :
B ((B.toDual hB).symm f) v = f v := by
change B.toDual hB ((B.toDual hB).symm f) v = f v
simp only [LinearEquiv.apply_symm_apply]
lemma Nondegenerate.flip {B : BilinForm K V} (hB : B.Nondegenerate) :
B.flip.Nondegenerate := by
intro x hx
apply (Module.evalEquiv K V).injective
ext f
obtain ⟨y, rfl⟩ := (B.toDual hB).surjective f
simpa using hx y
lemma nonDegenerateFlip_iff {B : BilinForm K V} :
B.flip.Nondegenerate ↔ B.Nondegenerate := ⟨Nondegenerate.flip, Nondegenerate.flip⟩
end FiniteDimensional
section DualBasis
variable {ι : Type*} [DecidableEq ι] [Finite ι]
/-- The `B`-dual basis `B.dualBasis hB b` to a finite basis `b` satisfies
`B (B.dualBasis hB b i) (b j) = B (b i) (B.dualBasis hB b j) = if i = j then 1 else 0`,
where `B` is a nondegenerate (symmetric) bilinear form and `b` is a finite basis. -/
noncomputable def dualBasis (B : BilinForm K V) (hB : B.Nondegenerate) (b : Basis ι K V) :
Basis ι K V :=
haveI := FiniteDimensional.of_fintype_basis b
b.dualBasis.map (B.toDual hB).symm
@[simp]
theorem dualBasis_repr_apply
(B : BilinForm K V) (hB : B.Nondegenerate) (b : Basis ι K V) (x i) :
(B.dualBasis hB b).repr x i = B x (b i) := by
#adaptation_note /-- https://github.com/leanprover/lean4/pull/4814
we did not need the `@` in front of `toDual_def` in the `rw`.
I'm confused! -/
rw [dualBasis, Basis.map_repr, LinearEquiv.symm_symm, LinearEquiv.trans_apply,
Basis.dualBasis_repr, @toDual_def]
theorem apply_dualBasis_left (B : BilinForm K V) (hB : B.Nondegenerate) (b : Basis ι K V) (i j) :
B (B.dualBasis hB b i) (b j) = if j = i then 1 else 0 := by
have := FiniteDimensional.of_fintype_basis b
rw [dualBasis, Basis.map_apply, Basis.coe_dualBasis, ← toDual_def hB,
LinearEquiv.apply_symm_apply, Basis.coord_apply, Basis.repr_self, Finsupp.single_apply]
theorem apply_dualBasis_right (B : BilinForm K V) (hB : B.Nondegenerate) (sym : B.IsSymm)
(b : Basis ι K V) (i j) : B (b i) (B.dualBasis hB b j) = if i = j then 1 else 0 := by
rw [sym.eq, apply_dualBasis_left]
@[simp]
lemma dualBasis_dualBasis_flip [FiniteDimensional K V]
(B : BilinForm K V) (hB : B.Nondegenerate) {ι : Type*}
[Finite ι] [DecidableEq ι] (b : Basis ι K V) :
B.dualBasis hB (B.flip.dualBasis hB.flip b) = b := by
ext i
refine LinearMap.ker_eq_bot.mp hB.ker_eq_bot ((B.flip.dualBasis hB.flip b).ext (fun j ↦ ?_))
simp_rw [apply_dualBasis_left, ← B.flip_apply, apply_dualBasis_left, @eq_comm _ i j]
@[simp]
lemma dualBasis_flip_dualBasis (B : BilinForm K V) (hB : B.Nondegenerate) {ι}
[Finite ι] [DecidableEq ι] [FiniteDimensional K V] (b : Basis ι K V) :
B.flip.dualBasis hB.flip (B.dualBasis hB b) = b :=
dualBasis_dualBasis_flip _ hB.flip b
@[simp]
lemma dualBasis_dualBasis (B : BilinForm K V) (hB : B.Nondegenerate) (hB' : B.IsSymm) {ι}
[Finite ι] [DecidableEq ι] [FiniteDimensional K V] (b : Basis ι K V) :
B.dualBasis hB (B.dualBasis hB b) = b := by
convert dualBasis_dualBasis_flip _ hB.flip b
rwa [eq_comm, ← isSymm_iff_flip]
end DualBasis
section LinearAdjoints
variable [FiniteDimensional K V]
/-- Given bilinear forms `B₁, B₂` where `B₂` is nondegenerate, `symmCompOfNondegenerate`
is the linear map `B₂ ∘ B₁`. -/
noncomputable def symmCompOfNondegenerate (B₁ B₂ : BilinForm K V) (b₂ : B₂.Nondegenerate) :
V →ₗ[K] V :=
(B₂.toDual b₂).symm.toLinearMap.comp B₁
theorem comp_symmCompOfNondegenerate_apply (B₁ : BilinForm K V) {B₂ : BilinForm K V}
(b₂ : B₂.Nondegenerate) (v : V) :
B₂ (B₁.symmCompOfNondegenerate B₂ b₂ v) = B₁ v := by
rw [symmCompOfNondegenerate]
simp only [coe_comp, LinearEquiv.coe_coe, Function.comp_apply, DFunLike.coe_fn_eq]
erw [LinearEquiv.apply_symm_apply (B₂.toDual b₂)]
@[simp]
theorem symmCompOfNondegenerate_left_apply (B₁ : BilinForm K V) {B₂ : BilinForm K V}
(b₂ : B₂.Nondegenerate) (v w : V) : B₂ (symmCompOfNondegenerate B₁ B₂ b₂ w) v = B₁ w v := by
conv_lhs => rw [comp_symmCompOfNondegenerate_apply]
/-- Given the nondegenerate bilinear form `B` and the linear map `φ`,
`leftAdjointOfNondegenerate` provides the left adjoint of `φ` with respect to `B`.
The lemma proving this property is `BilinForm.isAdjointPairLeftAdjointOfNondegenerate`. -/
noncomputable def leftAdjointOfNondegenerate (B : BilinForm K V) (b : B.Nondegenerate)
(φ : V →ₗ[K] V) : V →ₗ[K] V :=
symmCompOfNondegenerate (B.compRight φ) B b
theorem isAdjointPairLeftAdjointOfNondegenerate (B : BilinForm K V) (b : B.Nondegenerate)
(φ : V →ₗ[K] V) : IsAdjointPair B B (B.leftAdjointOfNondegenerate b φ) φ := fun x y =>
(B.compRight φ).symmCompOfNondegenerate_left_apply b y x
/-- Given the nondegenerate bilinear form `B`, the linear map `φ` has a unique left adjoint given by
`BilinForm.leftAdjointOfNondegenerate`. -/
theorem isAdjointPair_iff_eq_of_nondegenerate (B : BilinForm K V) (b : B.Nondegenerate)
(ψ φ : V →ₗ[K] V) : IsAdjointPair B B ψ φ ↔ ψ = B.leftAdjointOfNondegenerate b φ :=
⟨fun h =>
B.isAdjointPair_unique_of_nondegenerate b φ ψ _ h
(isAdjointPairLeftAdjointOfNondegenerate _ _ _),
fun h => h.symm ▸ isAdjointPairLeftAdjointOfNondegenerate _ _ _⟩
end LinearAdjoints
end BilinForm
end LinearMap
| Mathlib/LinearAlgebra/BilinearForm/Properties.lean | 471 | 474 | |
/-
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 :=
| Mathlib/Data/Set/Image.lean | 701 | 703 |
/-
Copyright (c) 2022 Floris van Doorn, Heather Macbeth. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Floris van Doorn, Heather Macbeth
-/
import Mathlib.Geometry.Manifold.ContMDiff.Atlas
import Mathlib.Geometry.Manifold.VectorBundle.FiberwiseLinear
import Mathlib.Topology.VectorBundle.Constructions
/-! # `C^n` vector bundles
This file defines `C^n` vector bundles over a manifold.
Let `E` be a topological vector bundle, with model fiber `F` and base space `B`. We consider `E` as
carrying a charted space structure given by its trivializations -- these are charts to `B × F`.
Then, by "composition", if `B` is itself a charted space over `H` (e.g. a smooth manifold), then `E`
is also a charted space over `H × F`.
Now, we define `ContMDiffVectorBundle` as the `Prop` of having `C^n` transition functions.
Recall the structure groupoid `contMDiffFiberwiseLinear` on `B × F` consisting of `C^n`, fiberwise
linear partial homeomorphisms. We show that our definition of "`C^n` vector bundle" implies
`HasGroupoid` for this groupoid, and show (by a "composition" of `HasGroupoid` instances) that
this means that a `C^n` vector bundle is a `C^n` manifold.
Since `ContMDiffVectorBundle` is a mixin, it should be easy to make variants and for many such
variants to coexist -- vector bundles can be `C^n` vector bundles over several different base
fields, etc.
## Main definitions and constructions
* `FiberBundle.chartedSpace`: A fiber bundle `E` over a base `B` with model fiber `F` is naturally
a charted space modelled on `B × F`.
* `FiberBundle.chartedSpace'`: Let `B` be a charted space modelled on `HB`. Then a fiber bundle
`E` over a base `B` with model fiber `F` is naturally a charted space modelled on `HB.prod F`.
* `ContMDiffVectorBundle`: Mixin class stating that a (topological) `VectorBundle` is `C^n`, in the
sense of having `C^n` transition functions, where the smoothness index `n`
belongs to `WithTop ℕ∞`.
* `ContMDiffFiberwiseLinear.hasGroupoid`: For a `C^n` vector bundle `E` over `B` with fiber
modelled on `F`, the change-of-co-ordinates between two trivializations `e`, `e'` for `E`,
considered as charts to `B × F`, is `C^n` and fiberwise linear, in the sense of belonging to the
structure groupoid `contMDiffFiberwiseLinear`.
* `Bundle.TotalSpace.isManifold`: A `C^n` vector bundle is naturally a `C^n` manifold.
* `VectorBundleCore.instContMDiffVectorBundle`: If a (topological) `VectorBundleCore` is `C^n`,
in the sense of having `C^n` transition functions (cf. `VectorBundleCore.IsContMDiff`),
then the vector bundle constructed from it is a `C^n` vector bundle.
* `VectorPrebundle.contMDiffVectorBundle`: If a `VectorPrebundle` is `C^n`,
in the sense of having `C^n` transition functions (cf. `VectorPrebundle.IsContMDiff`),
then the vector bundle constructed from it is a `C^n` vector bundle.
* `Bundle.Prod.contMDiffVectorBundle`: The direct sum of two `C^n` vector bundles is a `C^n`
vector bundle.
-/
assert_not_exists mfderiv
open Bundle Set PartialHomeomorph
open Function (id_def)
open Filter
open scoped Manifold Bundle Topology ContDiff
variable {n : WithTop ℕ∞} {𝕜 B B' F M : Type*} {E : B → Type*}
/-! ### Charted space structure on a fiber bundle -/
section
variable [TopologicalSpace F] [TopologicalSpace (TotalSpace F E)] [∀ x, TopologicalSpace (E x)]
{HB : Type*} [TopologicalSpace HB] [TopologicalSpace B] [ChartedSpace HB B] [FiberBundle F E]
/-- A fiber bundle `E` over a base `B` with model fiber `F` is naturally a charted space modelled on
`B × F`. -/
instance FiberBundle.chartedSpace' : ChartedSpace (B × F) (TotalSpace F E) where
atlas := (fun e : Trivialization F (π F E) => e.toPartialHomeomorph) '' trivializationAtlas F E
chartAt x := (trivializationAt F E x.proj).toPartialHomeomorph
mem_chart_source x :=
(trivializationAt F E x.proj).mem_source.mpr (mem_baseSet_trivializationAt F E x.proj)
chart_mem_atlas _ := mem_image_of_mem _ (trivialization_mem_atlas F E _)
theorem FiberBundle.chartedSpace'_chartAt (x : TotalSpace F E) :
chartAt (B × F) x = (trivializationAt F E x.proj).toPartialHomeomorph :=
rfl
/- Porting note: In Lean 3, the next instance was inside a section with locally reducible
`ModelProd` and it used `ModelProd B F` as the intermediate space. Using `B × F` in the middle
gives the same instance.
-/
--attribute [local reducible] ModelProd
/-- Let `B` be a charted space modelled on `HB`. Then a fiber bundle `E` over a base `B` with model
fiber `F` is naturally a charted space modelled on `HB.prod F`. -/
instance FiberBundle.chartedSpace : ChartedSpace (ModelProd HB F) (TotalSpace F E) :=
ChartedSpace.comp _ (B × F) _
theorem FiberBundle.chartedSpace_chartAt (x : TotalSpace F E) :
chartAt (ModelProd HB F) x =
(trivializationAt F E x.proj).toPartialHomeomorph ≫ₕ
(chartAt HB x.proj).prod (PartialHomeomorph.refl F) := by
dsimp only [chartAt_comp, prodChartedSpace_chartAt, FiberBundle.chartedSpace'_chartAt,
chartAt_self_eq]
rw [Trivialization.coe_coe, Trivialization.coe_fst' _ (mem_baseSet_trivializationAt F E x.proj)]
theorem FiberBundle.chartedSpace_chartAt_symm_fst (x : TotalSpace F E) (y : ModelProd HB F)
(hy : y ∈ (chartAt (ModelProd HB F) x).target) :
((chartAt (ModelProd HB F) x).symm y).proj = (chartAt HB x.proj).symm y.1 := by
simp only [FiberBundle.chartedSpace_chartAt, mfld_simps] at hy ⊢
exact (trivializationAt F E x.proj).proj_symm_apply hy.2
end
section
variable [NontriviallyNormedField 𝕜] [NormedAddCommGroup F] [NormedSpace 𝕜 F]
[TopologicalSpace (TotalSpace F E)] [∀ x, TopologicalSpace (E x)] {EB : Type*}
[NormedAddCommGroup EB] [NormedSpace 𝕜 EB] {HB : Type*} [TopologicalSpace HB]
{IB : ModelWithCorners 𝕜 EB HB} (E' : B → Type*) [∀ x, Zero (E' x)] {EM : Type*}
[NormedAddCommGroup EM] [NormedSpace 𝕜 EM] {HM : Type*} [TopologicalSpace HM]
{IM : ModelWithCorners 𝕜 EM HM} [TopologicalSpace M] [ChartedSpace HM M]
variable [TopologicalSpace B] [ChartedSpace HB B] [FiberBundle F E]
protected theorem FiberBundle.extChartAt (x : TotalSpace F E) :
extChartAt (IB.prod 𝓘(𝕜, F)) x =
(trivializationAt F E x.proj).toPartialEquiv ≫
(extChartAt IB x.proj).prod (PartialEquiv.refl F) := by
simp_rw [extChartAt, FiberBundle.chartedSpace_chartAt, extend]
simp only [PartialEquiv.trans_assoc, mfld_simps]
-- Porting note: should not be needed
| rw [PartialEquiv.prod_trans, PartialEquiv.refl_trans]
protected theorem FiberBundle.extChartAt_target (x : TotalSpace F E) :
(extChartAt (IB.prod 𝓘(𝕜, F)) x).target =
((extChartAt IB x.proj).target ∩
(extChartAt IB x.proj).symm ⁻¹' (trivializationAt F E x.proj).baseSet) ×ˢ univ := by
rw [FiberBundle.extChartAt, PartialEquiv.trans_target, Trivialization.target_eq, inter_prod]
rfl
| Mathlib/Geometry/Manifold/VectorBundle/Basic.lean | 138 | 145 |
/-
Copyright (c) 2022 Aaron Anderson. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Aaron Anderson
-/
import Mathlib.Computability.Encoding
import Mathlib.Logic.Small.List
import Mathlib.ModelTheory.Syntax
import Mathlib.SetTheory.Cardinal.Arithmetic
/-!
# Encodings and Cardinality of First-Order Syntax
## Main Definitions
- `FirstOrder.Language.Term.encoding` encodes terms as lists.
- `FirstOrder.Language.BoundedFormula.encoding` encodes bounded formulas as lists.
## Main Results
- `FirstOrder.Language.Term.card_le` shows that the number of terms in `L.Term α` is at most
`max ℵ₀ # (α ⊕ Σ i, L.Functions i)`.
- `FirstOrder.Language.BoundedFormula.card_le` shows that the number of bounded formulas in
`Σ n, L.BoundedFormula α n` is at most
`max ℵ₀ (Cardinal.lift.{max u v} #α + Cardinal.lift.{u'} L.card)`.
## TODO
- `Primcodable` instances for terms and formulas, based on the `encoding`s
- Computability facts about term and formula operations, to set up a computability approach to
incompleteness
-/
universe u v w u'
namespace FirstOrder
namespace Language
variable {L : Language.{u, v}}
variable {α : Type u'}
open FirstOrder Cardinal
open Computability List Structure Cardinal Fin
namespace Term
/-- Encodes a term as a list of variables and function symbols. -/
def listEncode : L.Term α → List (α ⊕ (Σ i, L.Functions i))
| var i => [Sum.inl i]
| func f ts =>
Sum.inr (⟨_, f⟩ : Σ i, L.Functions i)::(List.finRange _).flatMap fun i => (ts i).listEncode
/-- Decodes a list of variables and function symbols as a list of terms. -/
def listDecode : List (α ⊕ (Σ i, L.Functions i)) → List (L.Term α)
| [] => []
| Sum.inl a::l => (var a)::listDecode l
| Sum.inr ⟨n, f⟩::l =>
if h : n ≤ (listDecode l).length then
(func f (fun i => (listDecode l)[i])) :: (listDecode l).drop n
else []
theorem listDecode_encode_list (l : List (L.Term α)) :
listDecode (l.flatMap listEncode) = l := by
suffices h : ∀ (t : L.Term α) (l : List (α ⊕ (Σ i, L.Functions i))),
listDecode (t.listEncode ++ l) = t::listDecode l by
induction' l with t l lih
· rfl
· rw [flatMap_cons, h t (l.flatMap listEncode), lih]
intro t l
induction t generalizing l with
| var => rw [listEncode, singleton_append, listDecode]
| @func n f ts ih =>
rw [listEncode, cons_append, listDecode]
have h : listDecode (((finRange n).flatMap fun i : Fin n => (ts i).listEncode) ++ l) =
(finRange n).map ts ++ listDecode l := by
induction' finRange n with i l' l'ih
· rfl
· rw [flatMap_cons, List.append_assoc, ih, map_cons, l'ih, cons_append]
simp only [h, length_append, length_map, length_finRange, le_add_iff_nonneg_right,
_root_.zero_le, ↓reduceDIte, getElem_fin, cons.injEq, func.injEq, heq_eq_eq, true_and]
refine ⟨funext (fun i => ?_), ?_⟩
· simp only [length_map, length_finRange, is_lt, getElem_append_left, getElem_map,
getElem_finRange, cast_mk, Fin.eta]
· simp only [length_map, length_finRange, drop_left']
/-- An encoding of terms as lists. -/
@[simps]
protected def encoding : Encoding (L.Term α) where
Γ := α ⊕ (Σ i, L.Functions i)
encode := listEncode
decode l := (listDecode l).head?.join
decode_encode t := by
have h := listDecode_encode_list [t]
rw [flatMap_singleton] at h
simp only [Option.join, h, head?_cons, Option.pure_def, Option.bind_eq_bind, Option.some_bind,
id_eq]
theorem listEncode_injective :
Function.Injective (listEncode : L.Term α → List (α ⊕ (Σ i, L.Functions i))) :=
Term.encoding.encode_injective
theorem card_le : #(L.Term α) ≤ max ℵ₀ #(α ⊕ (Σ i, L.Functions i)) :=
lift_le.1 (_root_.trans Term.encoding.card_le_card_list (lift_le.2 (mk_list_le_max _)))
theorem card_sigma : #(Σ n, L.Term (α ⊕ (Fin n))) = max ℵ₀ #(α ⊕ (Σ i, L.Functions i)) := by
refine le_antisymm ?_ ?_
· rw [mk_sigma]
refine (sum_le_iSup_lift _).trans ?_
rw [mk_nat, lift_aleph0, mul_eq_max_of_aleph0_le_left le_rfl, max_le_iff,
ciSup_le_iff' (bddAbove_range _)]
· refine ⟨le_max_left _ _, fun i => card_le.trans ?_⟩
refine max_le (le_max_left _ _) ?_
rw [← add_eq_max le_rfl, mk_sum, mk_sum, mk_sum, add_comm (Cardinal.lift #α), lift_add,
add_assoc, lift_lift, lift_lift, mk_fin, lift_natCast]
exact add_le_add_right (nat_lt_aleph0 _).le _
· rw [← one_le_iff_ne_zero]
refine _root_.trans ?_ (le_ciSup (bddAbove_range _) 1)
rw [one_le_iff_ne_zero, mk_ne_zero_iff]
exact ⟨var (Sum.inr 0)⟩
· rw [max_le_iff, ← infinite_iff]
refine ⟨Infinite.of_injective (fun i => ⟨i + 1, var (Sum.inr i)⟩) fun i j ij => ?_, ?_⟩
· cases ij
rfl
· rw [Cardinal.le_def]
refine ⟨⟨Sum.elim (fun i => ⟨0, var (Sum.inl i)⟩)
fun F => ⟨1, func F.2 fun _ => var (Sum.inr 0)⟩, ?_⟩⟩
rintro (a | a) (b | b) h
· simp only [Sum.elim_inl, Sigma.mk.inj_iff, heq_eq_eq, var.injEq, Sum.inl.injEq, true_and]
at h
rw [h]
· simp only [Sum.elim_inl, Sum.elim_inr, Sigma.mk.inj_iff, false_and, reduceCtorEq] at h
· simp only [Sum.elim_inr, Sum.elim_inl, Sigma.mk.inj_iff, false_and, reduceCtorEq] at h
· simp only [Sum.elim_inr, Sigma.mk.inj_iff, heq_eq_eq, func.injEq, true_and] at h
rw [Sigma.ext_iff.2 ⟨h.1, h.2.1⟩]
instance [Encodable α] [Encodable (Σ i, L.Functions i)] : Encodable (L.Term α) :=
Encodable.ofLeftInjection listEncode (fun l => (listDecode l).head?.join) fun t => by
simp only
rw [← flatMap_singleton listEncode, listDecode_encode_list]
simp only [Option.join, head?_cons, Option.pure_def, Option.bind_eq_bind, Option.some_bind,
id_eq]
instance [h1 : Countable α] [h2 : Countable (Σ l, L.Functions l)] : Countable (L.Term α) := by
refine mk_le_aleph0_iff.1 (card_le.trans (max_le_iff.2 ?_))
simp only [le_refl, mk_sum, add_le_aleph0, lift_le_aleph0, true_and]
exact ⟨Cardinal.mk_le_aleph0, Cardinal.mk_le_aleph0⟩
instance small [Small.{u} α] : Small.{u} (L.Term α) :=
small_of_injective listEncode_injective
end Term
namespace BoundedFormula
/-- Encodes a bounded formula as a list of symbols. -/
def listEncode : ∀ {n : ℕ},
L.BoundedFormula α n → List ((Σk, L.Term (α ⊕ Fin k)) ⊕ ((Σ n, L.Relations n) ⊕ ℕ))
| n, falsum => [Sum.inr (Sum.inr (n + 2))]
| _, equal t₁ t₂ => [Sum.inl ⟨_, t₁⟩, Sum.inl ⟨_, t₂⟩]
| n, rel R ts => [Sum.inr (Sum.inl ⟨_, R⟩), Sum.inr (Sum.inr n)] ++
(List.finRange _).map fun i => Sum.inl ⟨n, ts i⟩
| _, imp φ₁ φ₂ => (Sum.inr (Sum.inr 0)::φ₁.listEncode) ++ φ₂.listEncode
| _, all φ => Sum.inr (Sum.inr 1)::φ.listEncode
/-- Applies the `forall` quantifier to an element of `(Σ n, L.BoundedFormula α n)`,
or returns `default` if not possible. -/
def sigmaAll : (Σ n, L.BoundedFormula α n) → Σ n, L.BoundedFormula α n
| ⟨n + 1, φ⟩ => ⟨n, φ.all⟩
| _ => default
@[simp]
lemma sigmaAll_apply {n} {φ : L.BoundedFormula α (n + 1)} :
sigmaAll ⟨n + 1, φ⟩ = ⟨n, φ.all⟩ := rfl
/-- Applies `imp` to two elements of `(Σ n, L.BoundedFormula α n)`,
or returns `default` if not possible. -/
def sigmaImp : (Σ n, L.BoundedFormula α n) → (Σ n, L.BoundedFormula α n) → Σ n, L.BoundedFormula α n
| ⟨m, φ⟩, ⟨n, ψ⟩ => if h : m = n then ⟨m, φ.imp (Eq.mp (by rw [h]) ψ)⟩ else default
/-- Decodes a list of symbols as a list of formulas. -/
@[simp]
lemma sigmaImp_apply {n} {φ ψ : L.BoundedFormula α n} :
sigmaImp ⟨n, φ⟩ ⟨n, ψ⟩ = ⟨n, φ.imp ψ⟩ := by
simp only [sigmaImp, ↓reduceDIte, eq_mp_eq_cast, cast_eq]
/-- Decodes a list of symbols as a list of formulas. -/
def listDecode :
List ((Σk, L.Term (α ⊕ Fin k)) ⊕ ((Σ n, L.Relations n) ⊕ ℕ)) → List (Σ n, L.BoundedFormula α n)
| Sum.inr (Sum.inr (n + 2))::l => ⟨n, falsum⟩::(listDecode l)
| Sum.inl ⟨n₁, t₁⟩::Sum.inl ⟨n₂, t₂⟩::l =>
(if h : n₁ = n₂ then ⟨n₁, equal t₁ (Eq.mp (by rw [h]) t₂)⟩ else default)::(listDecode l)
| Sum.inr (Sum.inl ⟨n, R⟩)::Sum.inr (Sum.inr k)::l => (
if h : ∀ i : Fin n, (l.map Sum.getLeft?)[i]?.join.isSome then
if h' : ∀ i, (Option.get _ (h i)).1 = k then
⟨k, BoundedFormula.rel R fun i => Eq.mp (by rw [h' i]) (Option.get _ (h i)).2⟩
else default
else default)::(listDecode (l.drop n))
| Sum.inr (Sum.inr 0)::l => if h : 2 ≤ (listDecode l).length
then (sigmaImp (listDecode l)[0] (listDecode l)[1])::(drop 2 (listDecode l))
else []
| Sum.inr (Sum.inr 1)::l => if h : 1 ≤ (listDecode l).length
then (sigmaAll (listDecode l)[0])::(drop 1 (listDecode l))
else []
| _ => []
termination_by l => l.length
@[simp]
theorem listDecode_encode_list (l : List (Σ n, L.BoundedFormula α n)) :
listDecode (l.flatMap (fun φ => φ.2.listEncode)) = l := by
suffices h : ∀ (φ : Σ n, L.BoundedFormula α n)
(l' : List ((Σk, L.Term (α ⊕ Fin k)) ⊕ ((Σ n, L.Relations n) ⊕ ℕ))),
(listDecode (listEncode φ.2 ++ l')) = φ::(listDecode l') by
induction' l with φ l ih
· rw [List.flatMap_nil]
simp [listDecode]
· rw [flatMap_cons, h φ _, ih]
rintro ⟨n, φ⟩
induction φ with
| falsum => intro l; rw [listEncode, singleton_append, listDecode]
| equal =>
intro l
rw [listEncode, cons_append, cons_append, listDecode, dif_pos]
· simp only [eq_mp_eq_cast, cast_eq, eq_self_iff_true, heq_iff_eq, and_self_iff, nil_append]
· simp only [eq_self_iff_true, heq_iff_eq, and_self_iff]
| @rel φ_n φ_l φ_R ts =>
intro l
rw [listEncode, cons_append, cons_append, singleton_append, cons_append, listDecode]
have h : ∀ i : Fin φ_l, ((List.map Sum.getLeft? (List.map (fun i : Fin φ_l =>
Sum.inl (⟨(⟨φ_n, rel φ_R ts⟩ : Σ n, L.BoundedFormula α n).fst, ts i⟩ :
Σ n, L.Term (α ⊕ (Fin n)))) (finRange φ_l) ++ l))[↑i]?).join = some ⟨_, ts i⟩ := by
intro i
simp only [Option.join, map_append, map_map, getElem?_fin, id, Option.bind_eq_some_iff,
getElem?_eq_some_iff, length_append, length_map, length_finRange, exists_eq_right]
refine ⟨lt_of_lt_of_le i.2 le_self_add, ?_⟩
rw [getElem_append_left, getElem_map]
· simp only [getElem_finRange, cast_mk, Fin.eta, Function.comp_apply, Sum.getLeft?_inl]
· simp only [length_map, length_finRange, is_lt]
rw [dif_pos]
swap
· exact fun i => Option.isSome_iff_exists.2 ⟨⟨_, ts i⟩, h i⟩
rw [dif_pos]
swap
· intro i
obtain ⟨h1, h2⟩ := Option.eq_some_iff_get_eq.1 (h i)
rw [h2]
simp only [Option.join, eq_mp_eq_cast, cons.injEq, Sigma.mk.inj_iff, heq_eq_eq, rel.injEq,
true_and]
refine ⟨funext fun i => ?_, ?_⟩
· obtain ⟨h1, h2⟩ := Option.eq_some_iff_get_eq.1 (h i)
rw [cast_eq_iff_heq]
exact (Sigma.ext_iff.1 ((Sigma.eta (Option.get _ h1)).trans h2)).2
rw [List.drop_append_eq_append_drop, length_map, length_finRange, Nat.sub_self, drop,
drop_eq_nil_of_le, nil_append]
rw [length_map, length_finRange]
| imp _ _ ih1 ih2 =>
intro l
simp only [] at *
rw [listEncode, List.append_assoc, cons_append, listDecode]
simp only [ih1, ih2, length_cons, le_add_iff_nonneg_left, _root_.zero_le, ↓reduceDIte,
getElem_cons_zero, getElem_cons_succ, sigmaImp_apply, drop_succ_cons, drop_zero]
| all _ ih =>
intro l
simp only [] at *
rw [listEncode, cons_append, listDecode]
simp only [ih, length_cons, le_add_iff_nonneg_left, _root_.zero_le, ↓reduceDIte,
getElem_cons_zero, sigmaAll_apply, drop_succ_cons, drop_zero]
/-- An encoding of bounded formulas as lists. -/
@[simps]
protected def encoding : Encoding (Σ n, L.BoundedFormula α n) where
Γ := (Σk, L.Term (α ⊕ Fin k)) ⊕ ((Σ n, L.Relations n) ⊕ ℕ)
encode φ := φ.2.listEncode
decode l := (listDecode l)[0]?
decode_encode φ := by
have h := listDecode_encode_list [φ]
rw [flatMap_singleton] at h
rw [h]
rfl
theorem listEncode_sigma_injective :
Function.Injective fun φ : Σ n, L.BoundedFormula α n => φ.2.listEncode :=
BoundedFormula.encoding.encode_injective
theorem card_le : #(Σ n, L.BoundedFormula α n) ≤
max ℵ₀ (Cardinal.lift.{max u v} #α + Cardinal.lift.{u'} L.card) := by
refine lift_le.1 (BoundedFormula.encoding.card_le_card_list.trans ?_)
rw [encoding_Γ, mk_list_eq_max_mk_aleph0, lift_max, lift_aleph0, lift_max, lift_aleph0,
max_le_iff]
refine ⟨?_, le_max_left _ _⟩
rw [mk_sum, Term.card_sigma, mk_sum, ← add_eq_max le_rfl, mk_sum, mk_nat]
simp only [lift_add, lift_lift, lift_aleph0]
rw [← add_assoc, add_comm, ← add_assoc, ← add_assoc, aleph0_add_aleph0, add_assoc,
add_eq_max le_rfl, add_assoc, card, Symbols, mk_sum, lift_add, lift_lift, lift_lift]
end BoundedFormula
end Language
end FirstOrder
| Mathlib/ModelTheory/Encoding.lean | 310 | 319 | |
/-
Copyright (c) 2015 Microsoft Corporation. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Leonardo de Moura, Mario Carneiro
-/
import Mathlib.Data.Sum.Basic
import Mathlib.Logic.Equiv.Option
import Mathlib.Logic.Equiv.Sum
import Mathlib.Logic.Function.Conjugate
import Mathlib.Tactic.CC
import Mathlib.Tactic.Lift
/-!
# Equivalence between types
In this file we continue the work on equivalences begun in `Mathlib/Logic/Equiv/Defs.lean`, defining
a lot of equivalences between various types and operations on these equivalences.
More definitions of this kind can be found in other files.
E.g., `Mathlib/Algebra/Equiv/TransferInstance.lean` does it for many algebraic type classes like
`Group`, `Module`, etc.
## Tags
equivalence, congruence, bijective map
-/
universe u v w z
open Function
-- Unless required to be `Type*`, all variables in this file are `Sort*`
variable {α α₁ α₂ β β₁ β₂ γ δ : Sort*}
namespace Equiv
/-- The product over `Option α` of `β a` is the binary product of the
product over `α` of `β (some α)` and `β none` -/
@[simps]
def piOptionEquivProd {α} {β : Option α → Type*} :
(∀ a : Option α, β a) ≃ β none × ∀ a : α, β (some a) where
toFun f := (f none, fun a => f (some a))
invFun x a := Option.casesOn a x.fst x.snd
left_inv f := funext fun a => by cases a <;> rfl
right_inv x := by simp
section subtypeCongr
/-- Combines an `Equiv` between two subtypes with an `Equiv` between their complements to form a
permutation. -/
def subtypeCongr {α} {p q : α → Prop} [DecidablePred p] [DecidablePred q]
(e : { x // p x } ≃ { x // q x }) (f : { x // ¬p x } ≃ { x // ¬q x }) : Perm α :=
(sumCompl p).symm.trans ((sumCongr e f).trans (sumCompl q))
variable {ε : Type*} {p : ε → Prop} [DecidablePred p]
variable (ep ep' : Perm { a // p a }) (en en' : Perm { a // ¬p a })
/-- Combining permutations on `ε` that permute only inside or outside the subtype
split induced by `p : ε → Prop` constructs a permutation on `ε`. -/
def Perm.subtypeCongr : Equiv.Perm ε :=
permCongr (sumCompl p) (sumCongr ep en)
theorem Perm.subtypeCongr.apply (a : ε) : ep.subtypeCongr en a =
if h : p a then (ep ⟨a, h⟩ : ε) else en ⟨a, h⟩ := by
by_cases h : p a <;> simp [Perm.subtypeCongr, h]
@[simp]
theorem Perm.subtypeCongr.left_apply {a : ε} (h : p a) : ep.subtypeCongr en a = ep ⟨a, h⟩ := by
simp [Perm.subtypeCongr.apply, h]
@[simp]
theorem Perm.subtypeCongr.left_apply_subtype (a : { a // p a }) : ep.subtypeCongr en a = ep a :=
Perm.subtypeCongr.left_apply ep en a.property
@[simp]
theorem Perm.subtypeCongr.right_apply {a : ε} (h : ¬p a) : ep.subtypeCongr en a = en ⟨a, h⟩ := by
simp [Perm.subtypeCongr.apply, h]
@[simp]
theorem Perm.subtypeCongr.right_apply_subtype (a : { a // ¬p a }) : ep.subtypeCongr en a = en a :=
Perm.subtypeCongr.right_apply ep en a.property
@[simp]
theorem Perm.subtypeCongr.refl :
Perm.subtypeCongr (Equiv.refl { a // p a }) (Equiv.refl { a // ¬p a }) = Equiv.refl ε := by
ext x
by_cases h : p x <;> simp [h]
@[simp]
theorem Perm.subtypeCongr.symm : (ep.subtypeCongr en).symm = Perm.subtypeCongr ep.symm en.symm := by
ext x
by_cases h : p x
· have : p (ep.symm ⟨x, h⟩) := Subtype.property _
simp [Perm.subtypeCongr.apply, h, symm_apply_eq, this]
· have : ¬p (en.symm ⟨x, h⟩) := Subtype.property (en.symm _)
simp [Perm.subtypeCongr.apply, h, symm_apply_eq, this]
@[simp]
theorem Perm.subtypeCongr.trans :
(ep.subtypeCongr en).trans (ep'.subtypeCongr en')
= Perm.subtypeCongr (ep.trans ep') (en.trans en') := by
ext x
by_cases h : p x
· have : p (ep ⟨x, h⟩) := Subtype.property _
simp [Perm.subtypeCongr.apply, h, this]
· have : ¬p (en ⟨x, h⟩) := Subtype.property (en _)
simp [Perm.subtypeCongr.apply, h, symm_apply_eq, this]
end subtypeCongr
section subtypePreimage
variable (p : α → Prop) [DecidablePred p] (x₀ : { a // p a } → β)
/-- For a fixed function `x₀ : {a // p a} → β` defined on a subtype of `α`,
the subtype of functions `x : α → β` that agree with `x₀` on the subtype `{a // p a}`
is naturally equivalent to the type of functions `{a // ¬ p a} → β`. -/
@[simps]
def subtypePreimage : { x : α → β // x ∘ Subtype.val = x₀ } ≃ ({ a // ¬p a } → β) where
toFun (x : { x : α → β // x ∘ Subtype.val = x₀ }) a := (x : α → β) a
invFun x := ⟨fun a => if h : p a then x₀ ⟨a, h⟩ else x ⟨a, h⟩, funext fun ⟨_, h⟩ => dif_pos h⟩
left_inv := fun ⟨x, hx⟩ =>
Subtype.val_injective <|
funext fun a => by
dsimp only
split_ifs
· rw [← hx]; rfl
· rfl
right_inv x :=
funext fun ⟨a, h⟩ =>
show dite (p a) _ _ = _ by
dsimp only
rw [dif_neg h]
theorem subtypePreimage_symm_apply_coe_pos (x : { a // ¬p a } → β) (a : α) (h : p a) :
((subtypePreimage p x₀).symm x : α → β) a = x₀ ⟨a, h⟩ :=
dif_pos h
theorem subtypePreimage_symm_apply_coe_neg (x : { a // ¬p a } → β) (a : α) (h : ¬p a) :
((subtypePreimage p x₀).symm x : α → β) a = x ⟨a, h⟩ :=
dif_neg h
end subtypePreimage
section
/-- A family of equivalences `∀ a, β₁ a ≃ β₂ a` generates an equivalence between `∀ a, β₁ a` and
`∀ a, β₂ a`. -/
@[simps]
def piCongrRight {β₁ β₂ : α → Sort*} (F : ∀ a, β₁ a ≃ β₂ a) : (∀ a, β₁ a) ≃ (∀ a, β₂ a) :=
⟨Pi.map fun a ↦ F a, Pi.map fun a ↦ (F a).symm, fun H => funext <| by simp,
fun H => funext <| by simp⟩
/-- Given `φ : α → β → Sort*`, we have an equivalence between `∀ a b, φ a b` and `∀ b a, φ a b`.
This is `Function.swap` as an `Equiv`. -/
@[simps apply]
def piComm (φ : α → β → Sort*) : (∀ a b, φ a b) ≃ ∀ b a, φ a b :=
⟨swap, swap, fun _ => rfl, fun _ => rfl⟩
@[simp]
theorem piComm_symm {φ : α → β → Sort*} : (piComm φ).symm = (piComm <| swap φ) :=
rfl
/-- Dependent `curry` equivalence: the type of dependent functions on `Σ i, β i` is equivalent
to the type of dependent functions of two arguments (i.e., functions to the space of functions).
This is `Sigma.curry` and `Sigma.uncurry` together as an equiv. -/
def piCurry {α} {β : α → Type*} (γ : ∀ a, β a → Type*) :
(∀ x : Σ i, β i, γ x.1 x.2) ≃ ∀ a b, γ a b where
toFun := Sigma.curry
invFun := Sigma.uncurry
left_inv := Sigma.uncurry_curry
right_inv := Sigma.curry_uncurry
-- `simps` overapplies these but `simps -fullyApplied` under-applies them
@[simp] theorem piCurry_apply {α} {β : α → Type*} (γ : ∀ a, β a → Type*)
(f : ∀ x : Σ i, β i, γ x.1 x.2) :
piCurry γ f = Sigma.curry f :=
rfl
@[simp] theorem piCurry_symm_apply {α} {β : α → Type*} (γ : ∀ a, β a → Type*) (f : ∀ a b, γ a b) :
(piCurry γ).symm f = Sigma.uncurry f :=
rfl
end
section prodCongr
variable {α₁ α₂ β₁ β₂ : Type*} (e : α₁ → β₁ ≃ β₂)
-- See also `Equiv.ofPreimageEquiv`.
/-- A family of equivalences between fibers gives an equivalence between domains. -/
@[simps!]
def ofFiberEquiv {α β γ} {f : α → γ} {g : β → γ}
(e : ∀ c, { a // f a = c } ≃ { b // g b = c }) : α ≃ β :=
(sigmaFiberEquiv f).symm.trans <| (Equiv.sigmaCongrRight e).trans (sigmaFiberEquiv g)
theorem ofFiberEquiv_map {α β γ} {f : α → γ} {g : β → γ}
(e : ∀ c, { a // f a = c } ≃ { b // g b = c }) (a : α) : g (ofFiberEquiv e a) = f a :=
(_ : { b // g b = _ }).property
end prodCongr
section
open Sum
/-- An equivalence that separates out the 0th fiber of `(Σ (n : ℕ), f n)`. -/
def sigmaNatSucc (f : ℕ → Type u) : (Σ n, f n) ≃ f 0 ⊕ Σ n, f (n + 1) :=
⟨fun x =>
@Sigma.casesOn ℕ f (fun _ => f 0 ⊕ Σ n, f (n + 1)) x fun n =>
@Nat.casesOn (fun i => f i → f 0 ⊕ Σ n : ℕ, f (n + 1)) n (fun x : f 0 => Sum.inl x)
fun (n : ℕ) (x : f n.succ) => Sum.inr ⟨n, x⟩,
Sum.elim (Sigma.mk 0) (Sigma.map Nat.succ fun _ => id), by rintro ⟨n | n, x⟩ <;> rfl, by
rintro (x | ⟨n, x⟩) <;> rfl⟩
end
section
open Sum Nat
/-- The set of natural numbers is equivalent to `ℕ ⊕ PUnit`. -/
def natEquivNatSumPUnit : ℕ ≃ ℕ ⊕ PUnit where
toFun n := Nat.casesOn n (inr PUnit.unit) inl
invFun := Sum.elim Nat.succ fun _ => 0
left_inv n := by cases n <;> rfl
right_inv := by rintro (_ | _) <;> rfl
/-- `ℕ ⊕ PUnit` is equivalent to `ℕ`. -/
def natSumPUnitEquivNat : ℕ ⊕ PUnit ≃ ℕ :=
natEquivNatSumPUnit.symm
/-- The type of integer numbers is equivalent to `ℕ ⊕ ℕ`. -/
def intEquivNatSumNat : ℤ ≃ ℕ ⊕ ℕ where
toFun z := Int.casesOn z inl inr
invFun := Sum.elim Int.ofNat Int.negSucc
left_inv := by rintro (m | n) <;> rfl
right_inv := by rintro (m | n) <;> rfl
end
/-- If `α` is equivalent to `β`, then `Unique α` is equivalent to `Unique β`. -/
def uniqueCongr (e : α ≃ β) : Unique α ≃ Unique β where
toFun h := @Equiv.unique _ _ h e.symm
invFun h := @Equiv.unique _ _ h e
left_inv _ := Subsingleton.elim _ _
right_inv _ := Subsingleton.elim _ _
/-- If `α` is equivalent to `β`, then `IsEmpty α` is equivalent to `IsEmpty β`. -/
theorem isEmpty_congr (e : α ≃ β) : IsEmpty α ↔ IsEmpty β :=
⟨fun h => @Function.isEmpty _ _ h e.symm, fun h => @Function.isEmpty _ _ h e⟩
protected theorem isEmpty (e : α ≃ β) [IsEmpty β] : IsEmpty α :=
e.isEmpty_congr.mpr ‹_›
section
open Subtype
/-- If `α` is equivalent to `β` and the predicates `p : α → Prop` and `q : β → Prop` are equivalent
at corresponding points, then `{a // p a}` is equivalent to `{b // q b}`.
For the statement where `α = β`, that is, `e : perm α`, see `Perm.subtypePerm`. -/
@[simps apply]
def subtypeEquiv {p : α → Prop} {q : β → Prop} (e : α ≃ β) (h : ∀ a, p a ↔ q (e a)) :
{ a : α // p a } ≃ { b : β // q b } where
toFun a := ⟨e a, (h _).mp a.property⟩
invFun b := ⟨e.symm b, (h _).mpr ((e.apply_symm_apply b).symm ▸ b.property)⟩
left_inv a := Subtype.ext <| by simp
right_inv b := Subtype.ext <| by simp
lemma coe_subtypeEquiv_eq_map {X Y} {p : X → Prop} {q : Y → Prop} (e : X ≃ Y)
(h : ∀ x, p x ↔ q (e x)) : ⇑(e.subtypeEquiv h) = Subtype.map e (h · |>.mp) :=
rfl
@[simp]
theorem subtypeEquiv_refl {p : α → Prop} (h : ∀ a, p a ↔ p (Equiv.refl _ a) := fun _ => Iff.rfl) :
(Equiv.refl α).subtypeEquiv h = Equiv.refl { a : α // p a } := by
ext
rfl
-- We use `as_aux_lemma` here to avoid creating large proof terms when using `simp`
@[simp]
theorem subtypeEquiv_symm {p : α → Prop} {q : β → Prop} (e : α ≃ β) (h : ∀ a : α, p a ↔ q (e a)) :
(e.subtypeEquiv h).symm =
e.symm.subtypeEquiv (by as_aux_lemma =>
intro a
convert (h <| e.symm a).symm
exact (e.apply_symm_apply a).symm) :=
rfl
@[simp]
theorem subtypeEquiv_trans {p : α → Prop} {q : β → Prop} {r : γ → Prop} (e : α ≃ β) (f : β ≃ γ)
(h : ∀ a : α, p a ↔ q (e a)) (h' : ∀ b : β, q b ↔ r (f b)) :
(e.subtypeEquiv h).trans (f.subtypeEquiv h')
= (e.trans f).subtypeEquiv (by as_aux_lemma => exact fun a => (h a).trans (h' <| e a)) :=
rfl
/-- If two predicates `p` and `q` are pointwise equivalent, then `{x // p x}` is equivalent to
`{x // q x}`. -/
@[simps!]
def subtypeEquivRight {p q : α → Prop} (e : ∀ x, p x ↔ q x) : { x // p x } ≃ { x // q x } :=
subtypeEquiv (Equiv.refl _) e
lemma subtypeEquivRight_apply {p q : α → Prop} (e : ∀ x, p x ↔ q x)
(z : { x // p x }) : subtypeEquivRight e z = ⟨z, (e z.1).mp z.2⟩ := rfl
lemma subtypeEquivRight_symm_apply {p q : α → Prop} (e : ∀ x, p x ↔ q x)
(z : { x // q x }) : (subtypeEquivRight e).symm z = ⟨z, (e z.1).mpr z.2⟩ := rfl
/-- If `α ≃ β`, then for any predicate `p : β → Prop` the subtype `{a // p (e a)}` is equivalent
to the subtype `{b // p b}`. -/
def subtypeEquivOfSubtype {p : β → Prop} (e : α ≃ β) : { a : α // p (e a) } ≃ { b : β // p b } :=
subtypeEquiv e <| by simp
/-- If `α ≃ β`, then for any predicate `p : α → Prop` the subtype `{a // p a}` is equivalent
to the subtype `{b // p (e.symm b)}`. This version is used by `equiv_rw`. -/
def subtypeEquivOfSubtype' {p : α → Prop} (e : α ≃ β) :
{ a : α // p a } ≃ { b : β // p (e.symm b) } :=
e.symm.subtypeEquivOfSubtype.symm
/-- If two predicates are equal, then the corresponding subtypes are equivalent. -/
def subtypeEquivProp {p q : α → Prop} (h : p = q) : Subtype p ≃ Subtype q :=
subtypeEquiv (Equiv.refl α) fun _ => h ▸ Iff.rfl
/-- A subtype of a subtype is equivalent to the subtype of elements satisfying both predicates. This
version allows the “inner” predicate to depend on `h : p a`. -/
@[simps]
def subtypeSubtypeEquivSubtypeExists (p : α → Prop) (q : Subtype p → Prop) :
Subtype q ≃ { a : α // ∃ h : p a, q ⟨a, h⟩ } :=
⟨fun a =>
⟨a.1, a.1.2, by
rcases a with ⟨⟨a, hap⟩, haq⟩
exact haq⟩,
fun a => ⟨⟨a, a.2.fst⟩, a.2.snd⟩, fun ⟨⟨_, _⟩, _⟩ => rfl, fun ⟨_, _, _⟩ => rfl⟩
/-- A subtype of a subtype is equivalent to the subtype of elements satisfying both predicates. -/
@[simps!]
def subtypeSubtypeEquivSubtypeInter {α : Type u} (p q : α → Prop) :
{ x : Subtype p // q x.1 } ≃ Subtype fun x => p x ∧ q x :=
(subtypeSubtypeEquivSubtypeExists p _).trans <|
subtypeEquivRight fun x => @exists_prop (q x) (p x)
/-- If the outer subtype has more restrictive predicate than the inner one,
then we can drop the latter. -/
@[simps!]
def subtypeSubtypeEquivSubtype {α} {p q : α → Prop} (h : ∀ {x}, q x → p x) :
{ x : Subtype p // q x.1 } ≃ Subtype q :=
(subtypeSubtypeEquivSubtypeInter p _).trans <| subtypeEquivRight fun _ => and_iff_right_of_imp h
/-- If a proposition holds for all elements, then the subtype is
equivalent to the original type. -/
@[simps apply symm_apply]
def subtypeUnivEquiv {α} {p : α → Prop} (h : ∀ x, p x) : Subtype p ≃ α :=
⟨fun x => x, fun x => ⟨x, h x⟩, fun _ => Subtype.eq rfl, fun _ => rfl⟩
/-- A subtype of a sigma-type is a sigma-type over a subtype. -/
def subtypeSigmaEquiv {α} (p : α → Type v) (q : α → Prop) : { y : Sigma p // q y.1 } ≃ Σ x :
Subtype q, p x.1 :=
⟨fun x => ⟨⟨x.1.1, x.2⟩, x.1.2⟩, fun x => ⟨⟨x.1.1, x.2⟩, x.1.2⟩, fun _ => rfl,
fun _ => rfl⟩
/-- A sigma type over a subtype is equivalent to the sigma set over the original type,
if the fiber is empty outside of the subset -/
def sigmaSubtypeEquivOfSubset {α} (p : α → Type v) (q : α → Prop) (h : ∀ x, p x → q x) :
(Σ x : Subtype q, p x) ≃ Σ x : α, p x :=
(subtypeSigmaEquiv p q).symm.trans <| subtypeUnivEquiv fun x => h x.1 x.2
/-- If a predicate `p : β → Prop` is true on the range of a map `f : α → β`, then
`Σ y : {y // p y}, {x // f x = y}` is equivalent to `α`. -/
def sigmaSubtypeFiberEquiv {α β : Type*} (f : α → β) (p : β → Prop) (h : ∀ x, p (f x)) :
(Σ y : Subtype p, { x : α // f x = y }) ≃ α :=
calc
_ ≃ Σy : β, { x : α // f x = y } := sigmaSubtypeEquivOfSubset _ p fun _ ⟨x, h'⟩ => h' ▸ h x
_ ≃ α := sigmaFiberEquiv f
/-- If for each `x` we have `p x ↔ q (f x)`, then `Σ y : {y // q y}, f ⁻¹' {y}` is equivalent
to `{x // p x}`. -/
def sigmaSubtypeFiberEquivSubtype {α β : Type*} (f : α → β) {p : α → Prop} {q : β → Prop}
(h : ∀ x, p x ↔ q (f x)) : (Σ y : Subtype q, { x : α // f x = y }) ≃ Subtype p :=
calc
(Σy : Subtype q, { x : α // f x = y }) ≃ Σy :
Subtype q, { x : Subtype p // Subtype.mk (f x) ((h x).1 x.2) = y } := by {
apply sigmaCongrRight
intro y
apply Equiv.symm
refine (subtypeSubtypeEquivSubtypeExists _ _).trans (subtypeEquivRight ?_)
intro x
exact ⟨fun ⟨hp, h'⟩ => congr_arg Subtype.val h', fun h' => ⟨(h x).2 (h'.symm ▸ y.2),
Subtype.eq h'⟩⟩ }
_ ≃ Subtype p := sigmaFiberEquiv fun x : Subtype p => (⟨f x, (h x).1 x.property⟩ : Subtype q)
/-- A sigma type over an `Option` is equivalent to the sigma set over the original type,
if the fiber is empty at none. -/
def sigmaOptionEquivOfSome {α} (p : Option α → Type v) (h : p none → False) :
(Σ x : Option α, p x) ≃ Σ x : α, p (some x) :=
haveI h' : ∀ x, p x → x.isSome := by
intro x
cases x
· intro n
exfalso
exact h n
· intro _
exact rfl
(sigmaSubtypeEquivOfSubset _ _ h').symm.trans (sigmaCongrLeft' (optionIsSomeEquiv α))
/-- The `Pi`-type `∀ i, π i` is equivalent to the type of sections `f : ι → Σ i, π i` of the
`Sigma` type such that for all `i` we have `(f i).fst = i`. -/
def piEquivSubtypeSigma (ι) (π : ι → Type*) :
(∀ i, π i) ≃ { f : ι → Σ i, π i // ∀ i, (f i).1 = i } where
toFun := fun f => ⟨fun i => ⟨i, f i⟩, fun _ => rfl⟩
invFun := fun f i => by rw [← f.2 i]; exact (f.1 i).2
left_inv := fun _ => funext fun _ => rfl
right_inv := fun ⟨f, hf⟩ =>
Subtype.eq <| funext fun i =>
Sigma.eq (hf i).symm <| eq_of_heq <| rec_heq_of_heq _ <| by simp
/-- The type of functions `f : ∀ a, β a` such that for all `a` we have `p a (f a)` is equivalent
to the type of functions `∀ a, {b : β a // p a b}`. -/
def subtypePiEquivPi {β : α → Sort v} {p : ∀ a, β a → Prop} :
{ f : ∀ a, β a // ∀ a, p a (f a) } ≃ ∀ a, { b : β a // p a b } where
toFun := fun f a => ⟨f.1 a, f.2 a⟩
invFun := fun f => ⟨fun a => (f a).1, fun a => (f a).2⟩
left_inv := by
rintro ⟨f, h⟩
rfl
right_inv := by
rintro f
funext a
exact Subtype.ext_val rfl
end
section subtypeEquivCodomain
variable {X Y : Sort*} [DecidableEq X] {x : X}
/-- The type of all functions `X → Y` with prescribed values for all `x' ≠ x`
is equivalent to the codomain `Y`. -/
def subtypeEquivCodomain (f : { x' // x' ≠ x } → Y) :
{ g : X → Y // g ∘ (↑) = f } ≃ Y :=
(subtypePreimage _ f).trans <|
@funUnique { x' // ¬x' ≠ x } _ <|
show Unique { x' // ¬x' ≠ x } from
@Equiv.unique _ _
(show Unique { x' // x' = x } from {
default := ⟨x, rfl⟩, uniq := fun ⟨_, h⟩ => Subtype.val_injective h })
(subtypeEquivRight fun _ => not_not)
@[simp]
theorem coe_subtypeEquivCodomain (f : { x' // x' ≠ x } → Y) :
(subtypeEquivCodomain f : _ → Y) =
fun g : { g : X → Y // g ∘ (↑) = f } => (g : X → Y) x :=
rfl
@[simp]
theorem subtypeEquivCodomain_apply (f : { x' // x' ≠ x } → Y) (g) :
subtypeEquivCodomain f g = (g : X → Y) x :=
rfl
theorem coe_subtypeEquivCodomain_symm (f : { x' // x' ≠ x } → Y) :
((subtypeEquivCodomain f).symm : Y → _) = fun y =>
⟨fun x' => if h : x' ≠ x then f ⟨x', h⟩ else y, by
funext x'
simp only [ne_eq, dite_not, comp_apply, Subtype.coe_eta, dite_eq_ite, ite_eq_right_iff]
intro w
exfalso
exact x'.property w⟩ :=
rfl
@[simp]
theorem subtypeEquivCodomain_symm_apply (f : { x' // x' ≠ x } → Y) (y : Y) (x' : X) :
((subtypeEquivCodomain f).symm y : X → Y) x' = if h : x' ≠ x then f ⟨x', h⟩ else y :=
rfl
theorem subtypeEquivCodomain_symm_apply_eq (f : { x' // x' ≠ x } → Y) (y : Y) :
((subtypeEquivCodomain f).symm y : X → Y) x = y :=
dif_neg (not_not.mpr rfl)
theorem subtypeEquivCodomain_symm_apply_ne
(f : { x' // x' ≠ x } → Y) (y : Y) (x' : X) (h : x' ≠ x) :
((subtypeEquivCodomain f).symm y : X → Y) x' = f ⟨x', h⟩ :=
dif_pos h
end subtypeEquivCodomain
instance : CanLift (α → β) (α ≃ β) (↑) Bijective where prf f hf := ⟨ofBijective f hf, rfl⟩
section
variable {α' β' : Type*} (e : Perm α') {p : β' → Prop} [DecidablePred p] (f : α' ≃ Subtype p)
/-- Extend the domain of `e : Equiv.Perm α` to one that is over `β` via `f : α → Subtype p`,
where `p : β → Prop`, permuting only the `b : β` that satisfy `p b`.
This can be used to extend the domain across a function `f : α → β`,
keeping everything outside of `Set.range f` fixed. For this use-case `Equiv` given by `f` can
be constructed by `Equiv.of_leftInverse'` or `Equiv.of_leftInverse` when there is a known
inverse, or `Equiv.ofInjective` in the general case.
-/
def Perm.extendDomain : Perm β' :=
(permCongr f e).subtypeCongr (Equiv.refl _)
@[simp]
theorem Perm.extendDomain_apply_image (a : α') : e.extendDomain f (f a) = f (e a) := by
simp [Perm.extendDomain]
theorem Perm.extendDomain_apply_subtype {b : β'} (h : p b) :
e.extendDomain f b = f (e (f.symm ⟨b, h⟩)) := by
simp [Perm.extendDomain, h]
theorem Perm.extendDomain_apply_not_subtype {b : β'} (h : ¬p b) : e.extendDomain f b = b := by
simp [Perm.extendDomain, h]
@[simp]
theorem Perm.extendDomain_refl : Perm.extendDomain (Equiv.refl _) f = Equiv.refl _ := by
simp [Perm.extendDomain]
@[simp]
theorem Perm.extendDomain_symm : (e.extendDomain f).symm = Perm.extendDomain e.symm f :=
rfl
theorem Perm.extendDomain_trans (e e' : Perm α') :
(e.extendDomain f).trans (e'.extendDomain f) = Perm.extendDomain (e.trans e') f := by
simp [Perm.extendDomain, permCongr_trans]
end
/-- Subtype of the quotient is equivalent to the quotient of the subtype. Let `α` be a setoid with
equivalence relation `~`. Let `p₂` be a predicate on the quotient type `α/~`, and `p₁` be the lift
of this predicate to `α`: `p₁ a ↔ p₂ ⟦a⟧`. Let `~₂` be the restriction of `~` to `{x // p₁ x}`.
Then `{x // p₂ x}` is equivalent to the quotient of `{x // p₁ x}` by `~₂`. -/
def subtypeQuotientEquivQuotientSubtype (p₁ : α → Prop) {s₁ : Setoid α} {s₂ : Setoid (Subtype p₁)}
(p₂ : Quotient s₁ → Prop) (hp₂ : ∀ a, p₁ a ↔ p₂ ⟦a⟧)
(h : ∀ x y : Subtype p₁, s₂.r x y ↔ s₁.r x y) : {x // p₂ x} ≃ Quotient s₂ where
toFun a :=
Quotient.hrecOn a.1 (fun a h => ⟦⟨a, (hp₂ _).2 h⟩⟧)
(fun a b hab => hfunext (by rw [Quotient.sound hab]) fun _ _ _ =>
heq_of_eq (Quotient.sound ((h _ _).2 hab)))
a.2
invFun a :=
Quotient.liftOn a (fun a => (⟨⟦a.1⟧, (hp₂ _).1 a.2⟩ : { x // p₂ x })) fun _ _ hab =>
Subtype.ext_val (Quotient.sound ((h _ _).1 hab))
left_inv := by exact fun ⟨a, ha⟩ => Quotient.inductionOn a (fun b hb => rfl) ha
right_inv a := by exact Quotient.inductionOn a fun ⟨a, ha⟩ => rfl
@[simp]
theorem subtypeQuotientEquivQuotientSubtype_mk (p₁ : α → Prop)
[s₁ : Setoid α] [s₂ : Setoid (Subtype p₁)] (p₂ : Quotient s₁ → Prop) (hp₂ : ∀ a, p₁ a ↔ p₂ ⟦a⟧)
(h : ∀ x y : Subtype p₁, s₂ x y ↔ (x : α) ≈ y)
(x hx) : subtypeQuotientEquivQuotientSubtype p₁ p₂ hp₂ h ⟨⟦x⟧, hx⟩ = ⟦⟨x, (hp₂ _).2 hx⟩⟧ :=
rfl
@[simp]
theorem subtypeQuotientEquivQuotientSubtype_symm_mk (p₁ : α → Prop)
[s₁ : Setoid α] [s₂ : Setoid (Subtype p₁)] (p₂ : Quotient s₁ → Prop) (hp₂ : ∀ a, p₁ a ↔ p₂ ⟦a⟧)
(h : ∀ x y : Subtype p₁, s₂ x y ↔ (x : α) ≈ y) (x) :
(subtypeQuotientEquivQuotientSubtype p₁ p₂ hp₂ h).symm ⟦x⟧ = ⟨⟦x⟧, (hp₂ _).1 x.property⟩ :=
rfl
section Swap
variable [DecidableEq α]
/-- A helper function for `Equiv.swap`. -/
def swapCore (a b r : α) : α :=
if r = a then b else if r = b then a else r
theorem swapCore_self (r a : α) : swapCore a a r = r := by
unfold swapCore
split_ifs <;> simp [*]
theorem swapCore_swapCore (r a b : α) : swapCore a b (swapCore a b r) = r := by
unfold swapCore; split_ifs <;> cc
theorem swapCore_comm (r a b : α) : swapCore a b r = swapCore b a r := by
unfold swapCore; split_ifs <;> cc
/-- `swap a b` is the permutation that swaps `a` and `b` and
leaves other values as is. -/
def swap (a b : α) : Perm α :=
⟨swapCore a b, swapCore a b, fun r => swapCore_swapCore r a b,
fun r => swapCore_swapCore r a b⟩
@[simp]
theorem swap_self (a : α) : swap a a = Equiv.refl _ :=
ext fun r => swapCore_self r a
theorem swap_comm (a b : α) : swap a b = swap b a :=
ext fun r => swapCore_comm r _ _
theorem swap_apply_def (a b x : α) : swap a b x = if x = a then b else if x = b then a else x :=
rfl
@[simp]
theorem swap_apply_left (a b : α) : swap a b a = b :=
if_pos rfl
@[simp]
theorem swap_apply_right (a b : α) : swap a b b = a := by
by_cases h : b = a <;> simp [swap_apply_def, h]
theorem swap_apply_of_ne_of_ne {a b x : α} : x ≠ a → x ≠ b → swap a b x = x := by
simp +contextual [swap_apply_def]
theorem eq_or_eq_of_swap_apply_ne_self {a b x : α} (h : swap a b x ≠ x) : x = a ∨ x = b := by
contrapose! h
exact swap_apply_of_ne_of_ne h.1 h.2
@[simp]
theorem swap_swap (a b : α) : (swap a b).trans (swap a b) = Equiv.refl _ :=
ext fun _ => swapCore_swapCore _ _ _
@[simp]
theorem symm_swap (a b : α) : (swap a b).symm = swap a b :=
rfl
@[simp]
theorem swap_eq_refl_iff {x y : α} : swap x y = Equiv.refl _ ↔ x = y := by
refine ⟨fun h => (Equiv.refl _).injective ?_, fun h => h ▸ swap_self _⟩
rw [← h, swap_apply_left, h, refl_apply]
theorem swap_comp_apply {a b x : α} (π : Perm α) :
π.trans (swap a b) x = if π x = a then b else if π x = b then a else π x := by
cases π
rfl
theorem swap_eq_update (i j : α) : (Equiv.swap i j : α → α) = update (update id j i) i j :=
funext fun x => by rw [update_apply _ i j, update_apply _ j i, Equiv.swap_apply_def, id]
theorem comp_swap_eq_update (i j : α) (f : α → β) :
f ∘ Equiv.swap i j = update (update f j (f i)) i (f j) := by
rw [swap_eq_update, comp_update, comp_update, comp_id]
@[simp]
theorem symm_trans_swap_trans [DecidableEq β] (a b : α) (e : α ≃ β) :
(e.symm.trans (swap a b)).trans e = swap (e a) (e b) :=
Equiv.ext fun x => by
have : ∀ a, e.symm x = a ↔ x = e a := fun a => by
rw [@eq_comm _ (e.symm x)]
constructor <;> intros <;> simp_all
simp only [trans_apply, swap_apply_def, this]
split_ifs <;> simp
@[simp]
theorem trans_swap_trans_symm [DecidableEq β] (a b : β) (e : α ≃ β) :
(e.trans (swap a b)).trans e.symm = swap (e.symm a) (e.symm b) :=
symm_trans_swap_trans a b e.symm
@[simp]
theorem swap_apply_self (i j a : α) : swap i j (swap i j a) = a := by
rw [← Equiv.trans_apply, Equiv.swap_swap, Equiv.refl_apply]
/-- A function is invariant to a swap if it is equal at both elements -/
theorem apply_swap_eq_self {v : α → β} {i j : α} (hv : v i = v j) (k : α) :
v (swap i j k) = v k := by
by_cases hi : k = i
· rw [hi, swap_apply_left, hv]
by_cases hj : k = j
· rw [hj, swap_apply_right, hv]
rw [swap_apply_of_ne_of_ne hi hj]
theorem swap_apply_eq_iff {x y z w : α} : swap x y z = w ↔ z = swap x y w := by
rw [apply_eq_iff_eq_symm_apply, symm_swap]
theorem swap_apply_ne_self_iff {a b x : α} : swap a b x ≠ x ↔ a ≠ b ∧ (x = a ∨ x = b) := by
by_cases hab : a = b
· simp [hab]
by_cases hax : x = a
· simp [hax, eq_comm]
by_cases hbx : x = b
· simp [hbx]
simp [hab, hax, hbx, swap_apply_of_ne_of_ne]
namespace Perm
@[simp]
theorem sumCongr_swap_refl {α β : Sort _} [DecidableEq α] [DecidableEq β] (i j : α) :
Equiv.Perm.sumCongr (Equiv.swap i j) (Equiv.refl β) = Equiv.swap (Sum.inl i) (Sum.inl j) := by
ext x
cases x
· simp only [Equiv.sumCongr_apply, Sum.map, coe_refl, comp_id, Sum.elim_inl, comp_apply,
swap_apply_def, Sum.inl.injEq]
split_ifs <;> rfl
· simp [Sum.map, swap_apply_of_ne_of_ne]
@[simp]
theorem sumCongr_refl_swap {α β : Sort _} [DecidableEq α] [DecidableEq β] (i j : β) :
Equiv.Perm.sumCongr (Equiv.refl α) (Equiv.swap i j) = Equiv.swap (Sum.inr i) (Sum.inr j) := by
ext x
cases x
· simp [Sum.map, swap_apply_of_ne_of_ne]
· simp only [Equiv.sumCongr_apply, Sum.map, coe_refl, comp_id, Sum.elim_inr, comp_apply,
swap_apply_def, Sum.inr.injEq]
split_ifs <;> rfl
end Perm
/-- Augment an equivalence with a prescribed mapping `f a = b` -/
def setValue (f : α ≃ β) (a : α) (b : β) : α ≃ β :=
(swap a (f.symm b)).trans f
@[simp]
theorem setValue_eq (f : α ≃ β) (a : α) (b : β) : setValue f a b a = b := by
simp [setValue, swap_apply_left]
end Swap
end Equiv
namespace Function.Involutive
/-- Convert an involutive function `f` to a permutation with `toFun = invFun = f`. -/
def toPerm (f : α → α) (h : Involutive f) : Equiv.Perm α :=
⟨f, f, h.leftInverse, h.rightInverse⟩
@[simp]
theorem coe_toPerm {f : α → α} (h : Involutive f) : (h.toPerm f : α → α) = f :=
rfl
@[simp]
theorem toPerm_symm {f : α → α} (h : Involutive f) : (h.toPerm f).symm = h.toPerm f :=
rfl
theorem toPerm_involutive {f : α → α} (h : Involutive f) : Involutive (h.toPerm f) :=
h
theorem symm_eq_self_of_involutive (f : Equiv.Perm α) (h : Involutive f) : f.symm = f :=
DFunLike.coe_injective (h.leftInverse_iff.mp f.left_inv)
end Function.Involutive
theorem PLift.eq_up_iff_down_eq {x : PLift α} {y : α} : x = PLift.up y ↔ x.down = y :=
Equiv.plift.eq_symm_apply
theorem Function.Injective.map_swap [DecidableEq α] [DecidableEq β] {f : α → β}
(hf : Function.Injective f) (x y z : α) :
f (Equiv.swap x y z) = Equiv.swap (f x) (f y) (f z) := by
conv_rhs => rw [Equiv.swap_apply_def]
split_ifs with h₁ h₂
· rw [hf h₁, Equiv.swap_apply_left]
· rw [hf h₂, Equiv.swap_apply_right]
· rw [Equiv.swap_apply_of_ne_of_ne (mt (congr_arg f) h₁) (mt (congr_arg f) h₂)]
namespace Equiv
section
/-- Transport dependent functions through an equivalence of the base space.
-/
@[simps apply, simps -isSimp symm_apply]
def piCongrLeft' (P : α → Sort*) (e : α ≃ β) : (∀ a, P a) ≃ ∀ b, P (e.symm b) where
toFun f x := f (e.symm x)
invFun f x := (e.symm_apply_apply x).ndrec (f (e x))
left_inv f := funext fun x =>
(by rintro _ rfl; rfl : ∀ {y} (h : y = x), h.ndrec (f y) = f x) (e.symm_apply_apply x)
right_inv f := funext fun x =>
(by rintro _ rfl; rfl : ∀ {y} (h : y = x), (congr_arg e.symm h).ndrec (f y) = f x)
(e.apply_symm_apply x)
/-- Note: the "obvious" statement `(piCongrLeft' P e).symm g a = g (e a)` doesn't typecheck: the
LHS would have type `P a` while the RHS would have type `P (e.symm (e a))`. For that reason,
we have to explicitly substitute along `e.symm (e a) = a` in the statement of this lemma. -/
add_decl_doc Equiv.piCongrLeft'_symm_apply
/-- This lemma is impractical to state in the dependent case. -/
@[simp]
theorem piCongrLeft'_symm (P : Sort*) (e : α ≃ β) :
(piCongrLeft' (fun _ => P) e).symm = piCongrLeft' _ e.symm := by ext; simp [piCongrLeft']
/-- Note: the "obvious" statement `(piCongrLeft' P e).symm g a = g (e a)` doesn't typecheck: the
LHS would have type `P a` while the RHS would have type `P (e.symm (e a))`. This lemma is a way
around it in the case where `a` is of the form `e.symm b`, so we can use `g b` instead of
`g (e (e.symm b))`. -/
@[simp]
lemma piCongrLeft'_symm_apply_apply (P : α → Sort*) (e : α ≃ β) (g : ∀ b, P (e.symm b)) (b : β) :
(piCongrLeft' P e).symm g (e.symm b) = g b := by
rw [piCongrLeft'_symm_apply, ← heq_iff_eq, rec_heq_iff_heq]
exact congr_arg_heq _ (e.apply_symm_apply _)
end
section
variable (P : β → Sort w) (e : α ≃ β)
/-- Transporting dependent functions through an equivalence of the base,
expressed as a "simplification".
-/
def piCongrLeft : (∀ a, P (e a)) ≃ ∀ b, P b :=
(piCongrLeft' P e.symm).symm
/-- Note: the "obvious" statement `(piCongrLeft P e) f b = f (e.symm b)` doesn't typecheck: the
LHS would have type `P b` while the RHS would have type `P (e (e.symm b))`. For that reason,
we have to explicitly substitute along `e (e.symm b) = b` in the statement of this lemma. -/
@[simp]
lemma piCongrLeft_apply (f : ∀ a, P (e a)) (b : β) :
(piCongrLeft P e) f b = e.apply_symm_apply b ▸ f (e.symm b) :=
rfl
@[simp]
lemma piCongrLeft_symm_apply (g : ∀ b, P b) (a : α) :
(piCongrLeft P e).symm g a = g (e a) :=
piCongrLeft'_apply P e.symm g a
/-- Note: the "obvious" statement `(piCongrLeft P e) f b = f (e.symm b)` doesn't typecheck: the
LHS would have type `P b` while the RHS would have type `P (e (e.symm b))`. This lemma is a way
around it in the case where `b` is of the form `e a`, so we can use `f a` instead of
`f (e.symm (e a))`. -/
lemma piCongrLeft_apply_apply (f : ∀ a, P (e a)) (a : α) :
(piCongrLeft P e) f (e a) = f a :=
piCongrLeft'_symm_apply_apply P e.symm f a
open Sum
lemma piCongrLeft_apply_eq_cast {P : β → Sort v} {e : α ≃ β}
(f : (a : α) → P (e a)) (b : β) :
piCongrLeft P e f b = cast (congr_arg P (e.apply_symm_apply b)) (f (e.symm b)) :=
Eq.rec_eq_cast _ _
theorem piCongrLeft_sumInl {ι ι' ι''} (π : ι'' → Type*) (e : ι ⊕ ι' ≃ ι'') (f : ∀ i, π (e (inl i)))
(g : ∀ i, π (e (inr i))) (i : ι) :
piCongrLeft π e (sumPiEquivProdPi (fun x => π (e x)) |>.symm (f, g)) (e (inl i)) = f i := by
simp_rw [piCongrLeft_apply_eq_cast, sumPiEquivProdPi_symm_apply,
sum_rec_congr _ _ _ (e.symm_apply_apply (inl i)), cast_cast, cast_eq]
theorem piCongrLeft_sumInr {ι ι' ι''} (π : ι'' → Type*) (e : ι ⊕ ι' ≃ ι'') (f : ∀ i, π (e (inl i)))
(g : ∀ i, π (e (inr i))) (j : ι') :
piCongrLeft π e (sumPiEquivProdPi (fun x => π (e x)) |>.symm (f, g)) (e (inr j)) = g j := by
simp_rw [piCongrLeft_apply_eq_cast, sumPiEquivProdPi_symm_apply,
sum_rec_congr _ _ _ (e.symm_apply_apply (inr j)), cast_cast, cast_eq]
@[deprecated (since := "2025-02-21")] alias piCongrLeft_sum_inl := piCongrLeft_sumInl
@[deprecated (since := "2025-02-21")] alias piCongrLeft_sum_inr := piCongrLeft_sumInr
end
section
variable {W : α → Sort w} {Z : β → Sort z} (h₁ : α ≃ β) (h₂ : ∀ a : α, W a ≃ Z (h₁ a))
/-- Transport dependent functions through
an equivalence of the base spaces and a family
of equivalences of the matching fibers.
-/
def piCongr : (∀ a, W a) ≃ ∀ b, Z b :=
(Equiv.piCongrRight h₂).trans (Equiv.piCongrLeft _ h₁)
@[simp]
theorem coe_piCongr_symm : ((h₁.piCongr h₂).symm :
(∀ b, Z b) → ∀ a, W a) = fun f a => (h₂ a).symm (f (h₁ a)) :=
rfl
theorem piCongr_symm_apply (f : ∀ b, Z b) :
(h₁.piCongr h₂).symm f = fun a => (h₂ a).symm (f (h₁ a)) :=
rfl
@[simp]
theorem piCongr_apply_apply (f : ∀ a, W a) (a : α) : h₁.piCongr h₂ f (h₁ a) = h₂ a (f a) := by
simp only [piCongr, piCongrRight, trans_apply, coe_fn_mk, piCongrLeft_apply_apply, Pi.map_apply]
end
section
variable {W : α → Sort w} {Z : β → Sort z} (h₁ : α ≃ β) (h₂ : ∀ b : β, W (h₁.symm b) ≃ Z b)
/-- Transport dependent functions through
an equivalence of the base spaces and a family
of equivalences of the matching fibres.
-/
def piCongr' : (∀ a, W a) ≃ ∀ b, Z b :=
(piCongr h₁.symm fun b => (h₂ b).symm).symm
@[simp]
theorem coe_piCongr' :
(h₁.piCongr' h₂ : (∀ a, W a) → ∀ b, Z b) = fun f b => h₂ b <| f <| h₁.symm b :=
rfl
theorem piCongr'_apply (f : ∀ a, W a) : h₁.piCongr' h₂ f = fun b => h₂ b <| f <| h₁.symm b :=
rfl
@[simp]
theorem piCongr'_symm_apply_symm_apply (f : ∀ b, Z b) (b : β) :
(h₁.piCongr' h₂).symm f (h₁.symm b) = (h₂ b).symm (f b) := by
simp [piCongr', piCongr_apply_apply]
end
/-- Transport dependent functions through an equality of sets. -/
@[simps!] def piCongrSet {α} {W : α → Sort w} {s t : Set α} (h : s = t) :
(∀ i : {i // i ∈ s}, W i) ≃ (∀ i : {i // i ∈ t}, W i) where
toFun f i := f ⟨i, h ▸ i.2⟩
invFun f i := f ⟨i, h.symm ▸ i.2⟩
left_inv f := rfl
right_inv f := rfl
section BinaryOp
variable {α₁ β₁ : Type*} (e : α₁ ≃ β₁) (f : α₁ → α₁ → α₁)
theorem semiconj_conj (f : α₁ → α₁) : Semiconj e f (e.conj f) := fun x => by simp
theorem semiconj₂_conj : Semiconj₂ e f (e.arrowCongr e.conj f) := fun x y => by simp [arrowCongr]
instance [Std.Associative f] : Std.Associative (e.arrowCongr (e.arrowCongr e) f) :=
(e.semiconj₂_conj f).isAssociative_right e.surjective
instance [Std.IdempotentOp f] : Std.IdempotentOp (e.arrowCongr (e.arrowCongr e) f) :=
(e.semiconj₂_conj f).isIdempotent_right e.surjective
end BinaryOp
section ULift
@[simp]
theorem ulift_symm_down {α} (x : α) : (Equiv.ulift.{u, v}.symm x).down = x :=
rfl
end ULift
end Equiv
theorem Function.Injective.swap_apply
[DecidableEq α] [DecidableEq β] {f : α → β} (hf : Function.Injective f) (x y z : α) :
Equiv.swap (f x) (f y) (f z) = f (Equiv.swap x y z) := by
by_cases hx : z = x
· simp [hx]
by_cases hy : z = y
· simp [hy]
rw [Equiv.swap_apply_of_ne_of_ne hx hy, Equiv.swap_apply_of_ne_of_ne (hf.ne hx) (hf.ne hy)]
theorem Function.Injective.swap_comp
[DecidableEq α] [DecidableEq β] {f : α → β} (hf : Function.Injective f) (x y : α) :
Equiv.swap (f x) (f y) ∘ f = f ∘ Equiv.swap x y :=
funext fun _ => hf.swap_apply _ _ _
/-- To give an equivalence between two subsingleton types, it is sufficient to give any two
functions between them. -/
def equivOfSubsingletonOfSubsingleton [Subsingleton α] [Subsingleton β] (f : α → β) (g : β → α) :
α ≃ β where
toFun := f
invFun := g
left_inv _ := Subsingleton.elim _ _
right_inv _ := Subsingleton.elim _ _
/-- A nonempty subsingleton type is (noncomputably) equivalent to `PUnit`. -/
noncomputable def Equiv.punitOfNonemptyOfSubsingleton [h : Nonempty α] [Subsingleton α] :
α ≃ PUnit :=
equivOfSubsingletonOfSubsingleton (fun _ => PUnit.unit) fun _ => h.some
/-- `Unique (Unique α)` is equivalent to `Unique α`. -/
def uniqueUniqueEquiv : Unique (Unique α) ≃ Unique α :=
equivOfSubsingletonOfSubsingleton (fun h => h.default) fun h =>
{ default := h, uniq := fun _ => Subsingleton.elim _ _ }
/-- If `Unique β`, then `Unique α` is equivalent to `α ≃ β`. -/
def uniqueEquivEquivUnique (α : Sort u) (β : Sort v) [Unique β] : Unique α ≃ (α ≃ β) :=
equivOfSubsingletonOfSubsingleton (fun _ => Equiv.ofUnique _ _) Equiv.unique
namespace Function
variable {α' : Sort*}
theorem update_comp_equiv [DecidableEq α'] [DecidableEq α] (f : α → β)
(g : α' ≃ α) (a : α) (v : β) :
update f a v ∘ g = update (f ∘ g) (g.symm a) v := by
rw [← update_comp_eq_of_injective _ g.injective, g.apply_symm_apply]
theorem update_apply_equiv_apply [DecidableEq α'] [DecidableEq α] (f : α → β)
(g : α' ≃ α) (a : α) (v : β) (a' : α') : update f a v (g a') = update (f ∘ g) (g.symm a) v a' :=
congr_fun (update_comp_equiv f g a v) a'
theorem piCongrLeft'_update [DecidableEq α] [DecidableEq β] (P : α → Sort*) (e : α ≃ β)
(f : ∀ a, P a) (b : β) (x : P (e.symm b)) :
e.piCongrLeft' P (update f (e.symm b) x) = update (e.piCongrLeft' P f) b x := by
ext b'
rcases eq_or_ne b' b with (rfl | h) <;> simp_all
theorem piCongrLeft'_symm_update [DecidableEq α] [DecidableEq β] (P : α → Sort*) (e : α ≃ β)
(f : ∀ b, P (e.symm b)) (b : β) (x : P (e.symm b)) :
(e.piCongrLeft' P).symm (update f b x) = update ((e.piCongrLeft' P).symm f) (e.symm b) x := by
simp [(e.piCongrLeft' P).symm_apply_eq, piCongrLeft'_update]
end Function
| Mathlib/Logic/Equiv/Basic.lean | 1,724 | 1,725 | |
/-
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.Ring.Divisibility.Lemmas
import Mathlib.Algebra.Lie.Nilpotent
import Mathlib.Algebra.Lie.Engel
import Mathlib.LinearAlgebra.Eigenspace.Pi
import Mathlib.RingTheory.Artinian.Module
import Mathlib.LinearAlgebra.Trace
import Mathlib.LinearAlgebra.FreeModule.PID
/-!
# Weight spaces of Lie modules of nilpotent Lie algebras
Just as a key tool when studying the behaviour of a linear operator is to decompose the space on
which it acts into a sum of (generalised) eigenspaces, a key tool when studying a representation `M`
of Lie algebra `L` is to decompose `M` into a sum of simultaneous eigenspaces of `x` as `x` ranges
over `L`. These simultaneous generalised eigenspaces are known as the weight spaces of `M`.
When `L` is nilpotent, it follows from the binomial theorem that weight spaces are Lie submodules.
Basic definitions and properties of the above ideas are provided in this file.
## Main definitions
* `LieModule.genWeightSpaceOf`
* `LieModule.genWeightSpace`
* `LieModule.Weight`
* `LieModule.posFittingCompOf`
* `LieModule.posFittingComp`
* `LieModule.iSup_ucs_eq_genWeightSpace_zero`
* `LieModule.iInf_lowerCentralSeries_eq_posFittingComp`
* `LieModule.isCompl_genWeightSpace_zero_posFittingComp`
* `LieModule.iSupIndep_genWeightSpace`
* `LieModule.iSup_genWeightSpace_eq_top`
## References
* [N. Bourbaki, *Lie Groups and Lie Algebras, Chapters 7--9*](bourbaki1975b)
## Tags
lie character, eigenvalue, eigenspace, weight, weight vector, root, root vector
-/
variable {K R L M : Type*} [CommRing R] [LieRing L] [LieAlgebra R L]
[AddCommGroup M] [Module R M] [LieRingModule L M] [LieModule R L M]
namespace LieModule
open Set Function TensorProduct LieModule
variable (M) in
/-- If `M` is a representation of a Lie algebra `L` and `χ : L → R` is a family of scalars,
then `weightSpace M χ` is the intersection of the `χ x`-eigenspaces
of the action of `x` on `M` as `x` ranges over `L`. -/
def weightSpace (χ : L → R) : LieSubmodule R L M where
__ := ⨅ x : L, (toEnd R L M x).eigenspace (χ x)
lie_mem {x m} hm := by simp_all [smul_comm (χ x)]
lemma mem_weightSpace (χ : L → R) (m : M) : m ∈ weightSpace M χ ↔ ∀ x, ⁅x, m⁆ = χ x • m := by
simp [weightSpace]
section notation_genWeightSpaceOf
/-- Until we define `LieModule.genWeightSpaceOf`, it is useful to have some notation as follows: -/
local notation3 "𝕎("M", " χ", " x")" => (toEnd R L M x).maxGenEigenspace χ
/-- See also `bourbaki1975b` Chapter VII §1.1, Proposition 2 (ii). -/
protected theorem weight_vector_multiplication (M₁ M₂ M₃ : Type*)
[AddCommGroup M₁] [Module R M₁] [LieRingModule L M₁] [LieModule R L M₁] [AddCommGroup M₂]
[Module R M₂] [LieRingModule L M₂] [LieModule R L M₂] [AddCommGroup M₃] [Module R M₃]
[LieRingModule L M₃] [LieModule R L M₃] (g : M₁ ⊗[R] M₂ →ₗ⁅R,L⁆ M₃) (χ₁ χ₂ : R) (x : L) :
LinearMap.range ((g : M₁ ⊗[R] M₂ →ₗ[R] M₃).comp (mapIncl 𝕎(M₁, χ₁, x) 𝕎(M₂, χ₂, x))) ≤
𝕎(M₃, χ₁ + χ₂, x) := by
-- Unpack the statement of the goal.
intro m₃
simp only [TensorProduct.mapIncl, LinearMap.mem_range, LinearMap.coe_comp,
LieModuleHom.coe_toLinearMap, Function.comp_apply, Pi.add_apply, exists_imp,
Module.End.mem_maxGenEigenspace]
rintro t rfl
-- Set up some notation.
let F : Module.End R M₃ := toEnd R L M₃ x - (χ₁ + χ₂) • ↑1
-- The goal is linear in `t` so use induction to reduce to the case that `t` is a pure tensor.
refine t.induction_on ?_ ?_ ?_
· use 0; simp only [LinearMap.map_zero, LieModuleHom.map_zero]
swap
· rintro t₁ t₂ ⟨k₁, hk₁⟩ ⟨k₂, hk₂⟩; use max k₁ k₂
simp only [LieModuleHom.map_add, LinearMap.map_add,
Module.End.pow_map_zero_of_le (le_max_left k₁ k₂) hk₁,
Module.End.pow_map_zero_of_le (le_max_right k₁ k₂) hk₂, add_zero]
-- Now the main argument: pure tensors.
rintro ⟨m₁, hm₁⟩ ⟨m₂, hm₂⟩
change ∃ k, (F ^ k) ((g : M₁ ⊗[R] M₂ →ₗ[R] M₃) (m₁ ⊗ₜ m₂)) = (0 : M₃)
-- Eliminate `g` from the picture.
let f₁ : Module.End R (M₁ ⊗[R] M₂) := (toEnd R L M₁ x - χ₁ • ↑1).rTensor M₂
let f₂ : Module.End R (M₁ ⊗[R] M₂) := (toEnd R L M₂ x - χ₂ • ↑1).lTensor M₁
have h_comm_square : F ∘ₗ ↑g = (g : M₁ ⊗[R] M₂ →ₗ[R] M₃).comp (f₁ + f₂) := by
ext m₁ m₂
simp only [f₁, f₂, F, ← g.map_lie x (m₁ ⊗ₜ m₂), add_smul, sub_tmul, tmul_sub, smul_tmul,
lie_tmul_right, tmul_smul, toEnd_apply_apply, LieModuleHom.map_smul,
Module.End.one_apply, LieModuleHom.coe_toLinearMap, LinearMap.smul_apply, Function.comp_apply,
LinearMap.coe_comp, LinearMap.rTensor_tmul, LieModuleHom.map_add, LinearMap.add_apply,
LieModuleHom.map_sub, LinearMap.sub_apply, LinearMap.lTensor_tmul,
AlgebraTensorModule.curry_apply, TensorProduct.curry_apply, LinearMap.toFun_eq_coe,
LinearMap.coe_restrictScalars]
abel
rsuffices ⟨k, hk⟩ : ∃ k : ℕ, ((f₁ + f₂) ^ k) (m₁ ⊗ₜ m₂) = 0
· use k
change (F ^ k) (g.toLinearMap (m₁ ⊗ₜ[R] m₂)) = 0
rw [← LinearMap.comp_apply, Module.End.commute_pow_left_of_commute h_comm_square,
LinearMap.comp_apply, hk, LinearMap.map_zero]
-- Unpack the information we have about `m₁`, `m₂`.
simp only [Module.End.mem_maxGenEigenspace] at hm₁ hm₂
obtain ⟨k₁, hk₁⟩ := hm₁
obtain ⟨k₂, hk₂⟩ := hm₂
have hf₁ : (f₁ ^ k₁) (m₁ ⊗ₜ m₂) = 0 := by
simp only [f₁, hk₁, zero_tmul, LinearMap.rTensor_tmul, LinearMap.rTensor_pow]
have hf₂ : (f₂ ^ k₂) (m₁ ⊗ₜ m₂) = 0 := by
simp only [f₂, hk₂, tmul_zero, LinearMap.lTensor_tmul, LinearMap.lTensor_pow]
-- It's now just an application of the binomial theorem.
use k₁ + k₂ - 1
have hf_comm : Commute f₁ f₂ := by
ext m₁ m₂
simp only [f₁, f₂, Module.End.mul_apply, LinearMap.rTensor_tmul, LinearMap.lTensor_tmul,
AlgebraTensorModule.curry_apply, LinearMap.toFun_eq_coe, LinearMap.lTensor_tmul,
TensorProduct.curry_apply, LinearMap.coe_restrictScalars]
rw [hf_comm.add_pow']
simp only [TensorProduct.mapIncl, Submodule.subtype_apply, Finset.sum_apply, Submodule.coe_mk,
LinearMap.coeFn_sum, TensorProduct.map_tmul, LinearMap.smul_apply]
-- The required sum is zero because each individual term is zero.
apply Finset.sum_eq_zero
rintro ⟨i, j⟩ hij
-- Eliminate the binomial coefficients from the picture.
suffices (f₁ ^ i * f₂ ^ j) (m₁ ⊗ₜ m₂) = 0 by rw [this]; apply smul_zero
-- Finish off with appropriate case analysis.
rcases Nat.le_or_le_of_add_eq_add_pred (Finset.mem_antidiagonal.mp hij) with hi | hj
· rw [(hf_comm.pow_pow i j).eq, Module.End.mul_apply, Module.End.pow_map_zero_of_le hi hf₁,
LinearMap.map_zero]
· rw [Module.End.mul_apply, Module.End.pow_map_zero_of_le hj hf₂, LinearMap.map_zero]
lemma lie_mem_maxGenEigenspace_toEnd
{χ₁ χ₂ : R} {x y : L} {m : M} (hy : y ∈ 𝕎(L, χ₁, x)) (hm : m ∈ 𝕎(M, χ₂, x)) :
⁅y, m⁆ ∈ 𝕎(M, χ₁ + χ₂, x) := by
apply LieModule.weight_vector_multiplication L M M (toModuleHom R L M) χ₁ χ₂
simp only [LieModuleHom.coe_toLinearMap, Function.comp_apply, LinearMap.coe_comp,
TensorProduct.mapIncl, LinearMap.mem_range]
use ⟨y, hy⟩ ⊗ₜ ⟨m, hm⟩
simp only [Submodule.subtype_apply, toModuleHom_apply, TensorProduct.map_tmul]
variable (M)
/-- If `M` is a representation of a nilpotent Lie algebra `L`, `χ` is a scalar, and `x : L`, then
`genWeightSpaceOf M χ x` is the maximal generalized `χ`-eigenspace of the action of `x` on `M`.
It is a Lie submodule because `L` is nilpotent. -/
def genWeightSpaceOf [LieRing.IsNilpotent L] (χ : R) (x : L) : LieSubmodule R L M :=
{ 𝕎(M, χ, x) with
lie_mem := by
intro y m hm
simp only [AddSubsemigroup.mem_carrier, AddSubmonoid.mem_toSubsemigroup,
Submodule.mem_toAddSubmonoid] at hm ⊢
rw [← zero_add χ]
exact lie_mem_maxGenEigenspace_toEnd (by simp) hm }
end notation_genWeightSpaceOf
variable (M)
variable [LieRing.IsNilpotent L]
theorem mem_genWeightSpaceOf (χ : R) (x : L) (m : M) :
m ∈ genWeightSpaceOf M χ x ↔ ∃ k : ℕ, ((toEnd R L M x - χ • ↑1) ^ k) m = 0 := by
simp [genWeightSpaceOf]
theorem coe_genWeightSpaceOf_zero (x : L) :
↑(genWeightSpaceOf M (0 : R) x) = ⨆ k, LinearMap.ker (toEnd R L M x ^ k) := by
simp [genWeightSpaceOf, ← Module.End.iSup_genEigenspace_eq]
/-- If `M` is a representation of a nilpotent Lie algebra `L`
and `χ : L → R` is a family of scalars,
then `genWeightSpace M χ` is the intersection of the maximal generalized `χ x`-eigenspaces
of the action of `x` on `M` as `x` ranges over `L`.
It is a Lie submodule because `L` is nilpotent. -/
def genWeightSpace (χ : L → R) : LieSubmodule R L M :=
⨅ x, genWeightSpaceOf M (χ x) x
theorem mem_genWeightSpace (χ : L → R) (m : M) :
m ∈ genWeightSpace M χ ↔ ∀ x, ∃ k : ℕ, ((toEnd R L M x - χ x • ↑1) ^ k) m = 0 := by
simp [genWeightSpace, mem_genWeightSpaceOf]
lemma genWeightSpace_le_genWeightSpaceOf (x : L) (χ : L → R) :
genWeightSpace M χ ≤ genWeightSpaceOf M (χ x) x :=
iInf_le _ x
lemma weightSpace_le_genWeightSpace (χ : L → R) :
weightSpace M χ ≤ genWeightSpace M χ := by
apply le_iInf
intro x
rw [← (LieSubmodule.toSubmodule_orderEmbedding R L M).le_iff_le]
apply (iInf_le _ x).trans
exact ((toEnd R L M x).genEigenspace (χ x)).monotone le_top
variable (R L) in
/-- A weight of a Lie module is a map `L → R` such that the corresponding weight space is
non-trivial. -/
structure Weight where
/-- The family of eigenvalues corresponding to a weight. -/
toFun : L → R
genWeightSpace_ne_bot' : genWeightSpace M toFun ≠ ⊥
namespace Weight
instance instFunLike : FunLike (Weight R L M) L R where
coe χ := χ.1
coe_injective' χ₁ χ₂ h := by cases χ₁; cases χ₂; simp_all
@[simp] lemma coe_weight_mk (χ : L → R) (h) :
(↑(⟨χ, h⟩ : Weight R L M) : L → R) = χ :=
rfl
lemma genWeightSpace_ne_bot (χ : Weight R L M) : genWeightSpace M χ ≠ ⊥ := χ.genWeightSpace_ne_bot'
variable {M}
@[ext] lemma ext {χ₁ χ₂ : Weight R L M} (h : ∀ x, χ₁ x = χ₂ x) : χ₁ = χ₂ := by
obtain ⟨f₁, _⟩ := χ₁; obtain ⟨f₂, _⟩ := χ₂; aesop
lemma ext_iff' {χ₁ χ₂ : Weight R L M} : (χ₁ : L → R) = χ₂ ↔ χ₁ = χ₂ := by simp
lemma exists_ne_zero (χ : Weight R L M) :
∃ x ∈ genWeightSpace M χ, x ≠ 0 := by
simpa [LieSubmodule.eq_bot_iff] using χ.genWeightSpace_ne_bot
instance [Subsingleton M] : IsEmpty (Weight R L M) :=
⟨fun h ↦ h.2 (Subsingleton.elim _ _)⟩
instance [Nontrivial (genWeightSpace M (0 : L → R))] : Zero (Weight R L M) :=
⟨0, fun e ↦ not_nontrivial (⊥ : LieSubmodule R L M) (e ▸ ‹_›)⟩
@[simp]
lemma coe_zero [Nontrivial (genWeightSpace M (0 : L → R))] : ((0 : Weight R L M) : L → R) = 0 := rfl
lemma zero_apply [Nontrivial (genWeightSpace M (0 : L → R))] (x) : (0 : Weight R L M) x = 0 := rfl
/-- The proposition that a weight of a Lie module is zero.
We make this definition because we cannot define a `Zero (Weight R L M)` instance since the weight
space of the zero function can be trivial. -/
def IsZero (χ : Weight R L M) := (χ : L → R) = 0
@[simp] lemma IsZero.eq {χ : Weight R L M} (hχ : χ.IsZero) : (χ : L → R) = 0 := hχ
@[simp] lemma coe_eq_zero_iff (χ : Weight R L M) : (χ : L → R) = 0 ↔ χ.IsZero := Iff.rfl
lemma isZero_iff_eq_zero [Nontrivial (genWeightSpace M (0 : L → R))] {χ : Weight R L M} :
χ.IsZero ↔ χ = 0 := Weight.ext_iff' (χ₂ := 0)
lemma isZero_zero [Nontrivial (genWeightSpace M (0 : L → R))] : IsZero (0 : Weight R L M) := rfl
/-- The proposition that a weight of a Lie module is non-zero. -/
abbrev IsNonZero (χ : Weight R L M) := ¬ IsZero (χ : Weight R L M)
lemma isNonZero_iff_ne_zero [Nontrivial (genWeightSpace M (0 : L → R))] {χ : Weight R L M} :
χ.IsNonZero ↔ χ ≠ 0 := isZero_iff_eq_zero.not
noncomputable instance : DecidablePred (IsNonZero (R := R) (L := L) (M := M)) := Classical.decPred _
variable (R L M) in
/-- The set of weights is equivalent to a subtype. -/
def equivSetOf : Weight R L M ≃ {χ : L → R | genWeightSpace M χ ≠ ⊥} where
toFun w := ⟨w.1, w.2⟩
invFun w := ⟨w.1, w.2⟩
left_inv w := by simp
right_inv w := by simp
lemma genWeightSpaceOf_ne_bot (χ : Weight R L M) (x : L) :
genWeightSpaceOf M (χ x) x ≠ ⊥ := by
have : ⨅ x, genWeightSpaceOf M (χ x) x ≠ ⊥ := χ.genWeightSpace_ne_bot
contrapose! this
rw [eq_bot_iff]
exact le_of_le_of_eq (iInf_le _ _) this
lemma hasEigenvalueAt (χ : Weight R L M) (x : L) :
(toEnd R L M x).HasEigenvalue (χ x) := by
obtain ⟨k : ℕ, hk : (toEnd R L M x).genEigenspace (χ x) k ≠ ⊥⟩ := by
simpa [genWeightSpaceOf, ← Module.End.iSup_genEigenspace_eq] using χ.genWeightSpaceOf_ne_bot x
exact Module.End.hasEigenvalue_of_hasGenEigenvalue hk
lemma apply_eq_zero_of_isNilpotent [NoZeroSMulDivisors R M] [IsReduced R]
(x : L) (h : _root_.IsNilpotent (toEnd R L M x)) (χ : Weight R L M) :
χ x = 0 :=
((χ.hasEigenvalueAt x).isNilpotent_of_isNilpotent h).eq_zero
end Weight
/-- See also the more useful form `LieModule.zero_genWeightSpace_eq_top_of_nilpotent`. -/
@[simp]
theorem zero_genWeightSpace_eq_top_of_nilpotent' [IsNilpotent L M] :
genWeightSpace M (0 : L → R) = ⊤ := by
ext
simp [genWeightSpace, genWeightSpaceOf]
theorem coe_genWeightSpace_of_top (χ : L → R) :
(genWeightSpace M (χ ∘ (⊤ : LieSubalgebra R L).incl) : Submodule R M) = genWeightSpace M χ := by
ext m
simp only [mem_genWeightSpace, LieSubmodule.mem_toSubmodule, Subtype.forall]
apply forall_congr'
simp
@[simp]
theorem zero_genWeightSpace_eq_top_of_nilpotent [IsNilpotent L M] :
genWeightSpace M (0 : (⊤ : LieSubalgebra R L) → R) = ⊤ := by
ext m
simp only [mem_genWeightSpace, Pi.zero_apply, zero_smul, sub_zero, Subtype.forall,
forall_true_left, LieSubalgebra.toEnd_mk, LieSubalgebra.mem_top, LieSubmodule.mem_top, iff_true]
intro x
obtain ⟨k, hk⟩ := exists_forall_pow_toEnd_eq_zero R L M
exact ⟨k, by simp [hk x]⟩
theorem exists_genWeightSpace_le_ker_of_isNoetherian [IsNoetherian R M] (χ : L → R) (x : L) :
∃ k : ℕ,
genWeightSpace M χ ≤ LinearMap.ker ((toEnd R L M x - algebraMap R _ (χ x)) ^ k) := by
use (toEnd R L M x).maxGenEigenspaceIndex (χ x)
intro m hm
replace hm : m ∈ (toEnd R L M x).maxGenEigenspace (χ x) :=
genWeightSpace_le_genWeightSpaceOf M x χ hm
rwa [Module.End.maxGenEigenspace_eq, Module.End.genEigenspace_nat] at hm
variable (R) in
theorem exists_genWeightSpace_zero_le_ker_of_isNoetherian
[IsNoetherian R M] (x : L) :
∃ k : ℕ, genWeightSpace M (0 : L → R) ≤ LinearMap.ker (toEnd R L M x ^ k) := by
simpa using exists_genWeightSpace_le_ker_of_isNoetherian M (0 : L → R) x
lemma isNilpotent_toEnd_sub_algebraMap [IsNoetherian R M] (χ : L → R) (x : L) :
_root_.IsNilpotent <| toEnd R L (genWeightSpace M χ) x - algebraMap R _ (χ x) := by
have : toEnd R L (genWeightSpace M χ) x - algebraMap R _ (χ x) =
(toEnd R L M x - algebraMap R _ (χ x)).restrict
(fun m hm ↦ sub_mem (LieSubmodule.lie_mem _ hm) (Submodule.smul_mem _ _ hm)) := by
rfl
obtain ⟨k, hk⟩ := exists_genWeightSpace_le_ker_of_isNoetherian M χ x
use k
ext ⟨m, hm⟩
simp only [this, Module.End.pow_restrict _, LinearMap.zero_apply, ZeroMemClass.coe_zero,
ZeroMemClass.coe_eq_zero]
exact ZeroMemClass.coe_eq_zero.mp (hk hm)
/-- A (nilpotent) Lie algebra acts nilpotently on the zero weight space of a Noetherian Lie
module. -/
theorem isNilpotent_toEnd_genWeightSpace_zero [IsNoetherian R M] (x : L) :
_root_.IsNilpotent <| toEnd R L (genWeightSpace M (0 : L → R)) x := by
simpa using isNilpotent_toEnd_sub_algebraMap M (0 : L → R) x
/-- By Engel's theorem, the zero weight space of a Noetherian Lie module is nilpotent. -/
instance [IsNoetherian R M] :
IsNilpotent L (genWeightSpace M (0 : L → R)) :=
isNilpotent_iff_forall'.mpr <| isNilpotent_toEnd_genWeightSpace_zero M
variable (R L)
@[simp]
lemma genWeightSpace_zero_normalizer_eq_self :
(genWeightSpace M (0 : L → R)).normalizer = genWeightSpace M 0 := by
refine le_antisymm ?_ (LieSubmodule.le_normalizer _)
intro m hm
rw [LieSubmodule.mem_normalizer] at hm
simp only [mem_genWeightSpace, Pi.zero_apply, zero_smul, sub_zero] at hm ⊢
intro y
obtain ⟨k, hk⟩ := hm y y
use k + 1
simpa [pow_succ, Module.End.mul_eq_comp]
lemma iSup_ucs_le_genWeightSpace_zero :
⨆ k, (⊥ : LieSubmodule R L M).ucs k ≤ genWeightSpace M (0 : L → R) := by
simpa using
LieSubmodule.ucs_le_of_normalizer_eq_self (genWeightSpace_zero_normalizer_eq_self R L M)
/-- See also `LieModule.iInf_lowerCentralSeries_eq_posFittingComp`. -/
lemma iSup_ucs_eq_genWeightSpace_zero [IsNoetherian R M] :
⨆ k, (⊥ : LieSubmodule R L M).ucs k = genWeightSpace M (0 : L → R) := by
obtain ⟨k, hk⟩ := (LieSubmodule.isNilpotent_iff_exists_self_le_ucs
<| genWeightSpace M (0 : L → R)).mp inferInstance
refine le_antisymm (iSup_ucs_le_genWeightSpace_zero R L M) (le_trans hk ?_)
exact le_iSup (fun k ↦ (⊥ : LieSubmodule R L M).ucs k) k
variable {L}
/-- If `M` is a representation of a nilpotent Lie algebra `L`, and `x : L`, then
`posFittingCompOf R M x` is the infimum of the decreasing system
`range φₓ ⊇ range φₓ² ⊇ range φₓ³ ⊇ ⋯` where `φₓ : End R M := toEnd R L M x`. We call this
the "positive Fitting component" because with appropriate assumptions (e.g., `R` is a field and
`M` is finite-dimensional) `φₓ` induces the so-called Fitting decomposition: `M = M₀ ⊕ M₁` where
`M₀ = genWeightSpaceOf M 0 x` and `M₁ = posFittingCompOf R M x`.
It is a Lie submodule because `L` is nilpotent. -/
def posFittingCompOf (x : L) : LieSubmodule R L M :=
{ toSubmodule := ⨅ k, LinearMap.range (toEnd R L M x ^ k)
lie_mem := by
set φ := toEnd R L M x
| intros y m hm
simp only [AddSubsemigroup.mem_carrier, AddSubmonoid.mem_toSubsemigroup,
Submodule.mem_toAddSubmonoid, Submodule.mem_iInf, LinearMap.mem_range] at hm ⊢
| Mathlib/Algebra/Lie/Weights/Basic.lean | 403 | 405 |
/-
Copyright (c) 2022 Antoine Labelle. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Antoine Labelle
-/
import Mathlib.LinearAlgebra.Contraction
import Mathlib.Algebra.Group.Equiv.TypeTags
/-!
# Monoid representations
This file introduces monoid representations and their characters and defines a few ways to construct
representations.
## Main definitions
* `Representation`
* `Representation.tprod`
* `Representation.linHom`
* `Representation.dual`
## Implementation notes
Representations of a monoid `G` on a `k`-module `V` are implemented as
homomorphisms `G →* (V →ₗ[k] V)`. We use the abbreviation `Representation` for this hom space.
The theorem `asAlgebraHom_def` constructs a module over the group `k`-algebra of `G` (implemented
as `MonoidAlgebra k G`) corresponding to a representation. If `ρ : Representation k G V`, this
module can be accessed via `ρ.asModule`. Conversely, given a `MonoidAlgebra k G`-module `M`,
`M.ofModule` is the associociated representation seen as a homomorphism.
-/
open MonoidAlgebra (lift of)
open LinearMap
section
variable (k G V : Type*) [CommSemiring k] [Monoid G] [AddCommMonoid V] [Module k V]
/-- A representation of `G` on the `k`-module `V` is a homomorphism `G →* (V →ₗ[k] V)`.
-/
abbrev Representation :=
G →* V →ₗ[k] V
end
namespace Representation
section trivial
variable (k G V : Type*) [CommSemiring k] [Monoid G] [AddCommMonoid V] [Module k V]
/-- The trivial representation of `G` on a `k`-module V.
-/
def trivial : Representation k G V :=
1
variable {G V}
@[simp]
theorem trivial_apply (g : G) (v : V) : trivial k G V g v = v :=
rfl
variable {k}
/-- A predicate for representations that fix every element. -/
class IsTrivial (ρ : Representation k G V) : Prop where
out : ∀ g, ρ g = LinearMap.id := by aesop
instance : IsTrivial (trivial k G V) where
@[simp]
theorem isTrivial_def (ρ : Representation k G V) [IsTrivial ρ] (g : G) :
ρ g = LinearMap.id := IsTrivial.out g
theorem isTrivial_apply (ρ : Representation k G V) [IsTrivial ρ] (g : G) (x : V) :
ρ g x = x := congr($(isTrivial_def ρ g) x)
end trivial
section MonoidAlgebra
variable {k G V : Type*} [CommSemiring k] [Monoid G] [AddCommMonoid V] [Module k V]
variable (ρ : Representation k G V)
/-- A `k`-linear representation of `G` on `V` can be thought of as
an algebra map from `MonoidAlgebra k G` into the `k`-linear endomorphisms of `V`.
-/
noncomputable def asAlgebraHom : MonoidAlgebra k G →ₐ[k] Module.End k V :=
(lift k G _) ρ
theorem asAlgebraHom_def : asAlgebraHom ρ = (lift k G _) ρ :=
rfl
@[simp]
theorem asAlgebraHom_single (g : G) (r : k) :
asAlgebraHom ρ (MonoidAlgebra.single g r) = r • ρ g := by
simp only [asAlgebraHom_def, MonoidAlgebra.lift_single]
theorem asAlgebraHom_single_one (g : G) : asAlgebraHom ρ (MonoidAlgebra.single g 1) = ρ g := by simp
theorem asAlgebraHom_of (g : G) : asAlgebraHom ρ (of k G g) = ρ g := by
simp only [MonoidAlgebra.of_apply, asAlgebraHom_single, one_smul]
/-- If `ρ : Representation k G V`, then `ρ.asModule` is a type synonym for `V`,
which we equip with an instance `Module (MonoidAlgebra k G) ρ.asModule`.
You should use `asModuleEquiv : ρ.asModule ≃+ V` to translate terms.
-/
@[nolint unusedArguments]
def asModule (_ : Representation k G V) :=
V
-- The `AddCommMonoid` and `Module` instances should be constructed by a deriving handler.
-- https://github.com/leanprover-community/mathlib4/issues/380
instance : AddCommMonoid (ρ.asModule) := inferInstanceAs <| AddCommMonoid V
instance : Inhabited ρ.asModule where
default := 0
/-- A `k`-linear representation of `G` on `V` can be thought of as
a module over `MonoidAlgebra k G`.
-/
noncomputable instance instModuleAsModule : Module (MonoidAlgebra k G) ρ.asModule :=
Module.compHom V (asAlgebraHom ρ).toRingHom
instance : Module k ρ.asModule := inferInstanceAs <| Module k V
/-- The additive equivalence from the `Module (MonoidAlgebra k G)` to the original vector space
of the representative.
This is just the identity, but it is helpful for typechecking and keeping track of instances.
-/
def asModuleEquiv : ρ.asModule ≃ₗ[k] V :=
LinearEquiv.refl _ _
@[simp]
theorem asModuleEquiv_map_smul (r : MonoidAlgebra k G) (x : ρ.asModule) :
ρ.asModuleEquiv (r • x) = ρ.asAlgebraHom r (ρ.asModuleEquiv x) :=
rfl
theorem asModuleEquiv_symm_map_smul (r : k) (x : V) :
ρ.asModuleEquiv.symm (r • x) = algebraMap k (MonoidAlgebra k G) r • ρ.asModuleEquiv.symm x := by
rw [LinearEquiv.symm_apply_eq]
simp
@[simp]
theorem asModuleEquiv_symm_map_rho (g : G) (x : V) :
ρ.asModuleEquiv.symm (ρ g x) = MonoidAlgebra.of k G g • ρ.asModuleEquiv.symm x := by
rw [LinearEquiv.symm_apply_eq]
simp
/-- Build a `Representation k G M` from a `[Module (MonoidAlgebra k G) M]`.
This version is not always what we want, as it relies on an existing `[Module k M]`
instance, along with a `[IsScalarTower k (MonoidAlgebra k G) M]` instance.
We remedy this below in `ofModule`
(with the tradeoff that the representation is defined
only on a type synonym of the original module.)
-/
noncomputable def ofModule' (M : Type*) [AddCommMonoid M] [Module k M]
[Module (MonoidAlgebra k G) M] [IsScalarTower k (MonoidAlgebra k G) M] : Representation k G M :=
(MonoidAlgebra.lift k G (M →ₗ[k] M)).symm (Algebra.lsmul k k M)
section
variable (M : Type*) [AddCommMonoid M] [Module (MonoidAlgebra k G) M]
/-- Build a `Representation` from a `[Module (MonoidAlgebra k G) M]`.
Note that the representation is built on `restrictScalars k (MonoidAlgebra k G) M`,
rather than on `M` itself.
-/
noncomputable def ofModule : Representation k G (RestrictScalars k (MonoidAlgebra k G) M) :=
(MonoidAlgebra.lift k G
(RestrictScalars k (MonoidAlgebra k G) M →ₗ[k]
RestrictScalars k (MonoidAlgebra k G) M)).symm
(RestrictScalars.lsmul k (MonoidAlgebra k G) M)
/-!
## `ofModule` and `asModule` are inverses.
This requires a little care in both directions:
this is a categorical equivalence, not an isomorphism.
See `Rep.equivalenceModuleMonoidAlgebra` for the full statement.
Starting with `ρ : Representation k G V`, converting to a module and back again
we have a `Representation k G (restrictScalars k (MonoidAlgebra k G) ρ.asModule)`.
To compare these, we use the composition of `restrictScalarsAddEquiv` and `ρ.asModuleEquiv`.
Similarly, starting with `Module (MonoidAlgebra k G) M`,
after we convert to a representation and back to a module,
we have `Module (MonoidAlgebra k G) (restrictScalars k (MonoidAlgebra k G) M)`.
-/
@[simp]
theorem ofModule_asAlgebraHom_apply_apply (r : MonoidAlgebra k G)
(m : RestrictScalars k (MonoidAlgebra k G) M) :
((ofModule M).asAlgebraHom r) m =
(RestrictScalars.addEquiv _ _ _).symm (r • RestrictScalars.addEquiv _ _ _ m) := by
apply MonoidAlgebra.induction_on r
· intro g
simp only [one_smul, MonoidAlgebra.lift_symm_apply, MonoidAlgebra.of_apply,
Representation.asAlgebraHom_single, Representation.ofModule, AddEquiv.apply_eq_iff_eq,
RestrictScalars.lsmul_apply_apply]
· intro f g fw gw
simp only [fw, gw, map_add, add_smul, LinearMap.add_apply]
· intro r f w
simp only [w, map_smul, LinearMap.smul_apply, RestrictScalars.addEquiv_symm_map_smul_smul]
@[simp]
theorem ofModule_asModule_act (g : G) (x : RestrictScalars k (MonoidAlgebra k G) ρ.asModule) :
ofModule (k := k) (G := G) ρ.asModule g x = -- Porting note: more help with implicit
(RestrictScalars.addEquiv _ _ _).symm
(ρ.asModuleEquiv.symm (ρ g (ρ.asModuleEquiv (RestrictScalars.addEquiv _ _ _ x)))) := by
apply_fun RestrictScalars.addEquiv _ _ ρ.asModule using
(RestrictScalars.addEquiv _ _ ρ.asModule).injective
dsimp [ofModule, RestrictScalars.lsmul_apply_apply]
simp
theorem smul_ofModule_asModule (r : MonoidAlgebra k G) (m : (ofModule M).asModule) :
(RestrictScalars.addEquiv k _ _) ((ofModule M).asModuleEquiv (r • m)) =
r • (RestrictScalars.addEquiv k _ _) ((ofModule M).asModuleEquiv (G := G) m) := by
dsimp
simp only [AddEquiv.apply_symm_apply, ofModule_asAlgebraHom_apply_apply]
end
@[simp]
lemma single_smul (t : k) (g : G) (v : ρ.asModule) :
MonoidAlgebra.single (g : G) t • v = t • ρ g (ρ.asModuleEquiv v) := by
rw [← LinearMap.smul_apply, ← asAlgebraHom_single, ← asModuleEquiv_map_smul]
rfl
instance : IsScalarTower k (MonoidAlgebra k G) ρ.asModule where
smul_assoc t x v := by
revert t
apply x.induction_on
· simp
· intro y z hy hz
simp [add_smul, hy, hz]
· intro s y hy t
rw [← smul_assoc, smul_eq_mul, hy (t * s), ← smul_eq_mul, smul_assoc]
aesop
end MonoidAlgebra
section AddCommGroup
variable {k G V : Type*} [CommRing k] [Monoid G] [I : AddCommGroup V] [Module k V]
variable (ρ : Representation k G V)
instance : AddCommGroup ρ.asModule :=
I
end AddCommGroup
section MulAction
variable (k : Type*) [CommSemiring k] (G : Type*) [Monoid G] (H : Type*) [MulAction G H]
/-- A `G`-action on `H` induces a representation `G →* End(k[H])` in the natural way. -/
noncomputable def ofMulAction : Representation k G (H →₀ k) where
toFun g := Finsupp.lmapDomain k k (g • ·)
map_one' := by
ext x y
dsimp
simp
map_mul' x y := by
ext z w
simp [mul_smul]
variable {k G H}
theorem ofMulAction_def (g : G) : ofMulAction k G H g = Finsupp.lmapDomain k k (g • ·) :=
rfl
@[simp]
theorem ofMulAction_single (g : G) (x : H) (r : k) :
ofMulAction k G H g (Finsupp.single x r) = Finsupp.single (g • x) r :=
Finsupp.mapDomain_single
end MulAction
section DistribMulAction
variable (k G A : Type*) [CommSemiring k] [Monoid G] [AddCommMonoid A] [Module k A]
[DistribMulAction G A] [SMulCommClass G k A]
/-- Turns a `k`-module `A` with a compatible `DistribMulAction` of a monoid `G` into a
`k`-linear `G`-representation on `A`. -/
def ofDistribMulAction : Representation k G A where
toFun := fun m =>
{ DistribMulAction.toAddMonoidEnd G A m with
map_smul' := smul_comm _ }
map_one' := by ext; exact one_smul _ _
map_mul' := by intros; ext; exact mul_smul _ _ _
variable {k G A}
@[simp] theorem ofDistribMulAction_apply_apply (g : G) (a : A) :
ofDistribMulAction k G A g a = g • a := rfl
end DistribMulAction
section MulDistribMulAction
variable (M G : Type*) [Monoid M] [CommGroup G] [MulDistribMulAction M G]
/-- Turns a `CommGroup` `G` with a `MulDistribMulAction` of a monoid `M` into a
`ℤ`-linear `M`-representation on `Additive G`. -/
def ofMulDistribMulAction : Representation ℤ M (Additive G) :=
(addMonoidEndRingEquivInt (Additive G) : AddMonoid.End (Additive G) →* _).comp
((monoidEndToAdditive G : _ →* _).comp (MulDistribMulAction.toMonoidEnd M G))
@[simp] theorem ofMulDistribMulAction_apply_apply (g : M) (a : Additive G) :
ofMulDistribMulAction M G g a = Additive.ofMul (g • a.toMul) := rfl
end MulDistribMulAction
section Group
variable {k G V : Type*} [CommSemiring k] [Group G] [AddCommMonoid V] [Module k V]
variable (ρ : Representation k G V)
@[simp]
theorem ofMulAction_apply {H : Type*} [MulAction G H] (g : G) (f : H →₀ k) (h : H) :
ofMulAction k G H g f h = f (g⁻¹ • h) := by
conv_lhs => rw [← smul_inv_smul g h]
let h' := g⁻¹ • h
change ofMulAction k G H g f (g • h') = f h'
have hg : Function.Injective (g • · : H → H) := by
intro h₁ h₂
simp
simp only [ofMulAction_def, Finsupp.lmapDomain_apply, Finsupp.mapDomain_apply, hg]
-- Porting note: did not need this in ML3; noncomputable because IR check complains
noncomputable instance :
HMul (MonoidAlgebra k G) ((ofMulAction k G G).asModule) (MonoidAlgebra k G) :=
inferInstanceAs <| HMul (MonoidAlgebra k G) (MonoidAlgebra k G) (MonoidAlgebra k G)
theorem ofMulAction_self_smul_eq_mul (x : MonoidAlgebra k G) (y : (ofMulAction k G G).asModule) :
x • y = (x * y : MonoidAlgebra k G) := -- by
-- Porting note: trouble figuring out the motive
x.induction_on (p := fun z => z • y = z * y)
(fun g => by
show asAlgebraHom (ofMulAction k G G) _ _ = _; ext
simp only [MonoidAlgebra.of_apply, asAlgebraHom_single, one_smul,
ofMulAction_apply, smul_eq_mul]
-- Porting note: single_mul_apply not firing in simp
rw [MonoidAlgebra.single_mul_apply, one_mul]
)
(fun x y hx hy => by simp only [hx, hy, add_mul, add_smul]) fun r x hx => by
show asAlgebraHom (ofMulAction k G G) _ _ = _ -- Porting note: was simpa [← hx]
simp only [map_smul, smul_apply, Algebra.smul_mul_assoc]
rw [← hx]
rfl
/-- If we equip `k[G]` with the `k`-linear `G`-representation induced by the left regular action of
`G` on itself, the resulting object is isomorphic as a `k[G]`-module to `k[G]` with its natural
`k[G]`-module structure. -/
@[simps]
noncomputable def ofMulActionSelfAsModuleEquiv :
(ofMulAction k G G).asModule ≃ₗ[MonoidAlgebra k G] MonoidAlgebra k G :=
{ (asModuleEquiv _).toAddEquiv with map_smul' := ofMulAction_self_smul_eq_mul }
/-- When `G` is a group, a `k`-linear representation of `G` on `V` can be thought of as
a group homomorphism from `G` into the invertible `k`-linear endomorphisms of `V`.
-/
def asGroupHom : G →* Units (V →ₗ[k] V) :=
MonoidHom.toHomUnits ρ
theorem asGroupHom_apply (g : G) : ↑(asGroupHom ρ g) = ρ g := by
simp only [asGroupHom, MonoidHom.coe_toHomUnits]
end Group
section TensorProduct
variable {k G V W : Type*} [CommSemiring k] [Monoid G]
variable [AddCommMonoid V] [Module k V] [AddCommMonoid W] [Module k W]
variable (ρV : Representation k G V) (ρW : Representation k G W)
open TensorProduct
/-- Given representations of `G` on `V` and `W`, there is a natural representation of `G` on their
tensor product `V ⊗[k] W`.
-/
noncomputable def tprod : Representation k G (V ⊗[k] W) where
toFun g := TensorProduct.map (ρV g) (ρW g)
map_one' := by simp only [map_one, TensorProduct.map_one]
map_mul' g h := by simp only [map_mul, TensorProduct.map_mul]
local notation ρV " ⊗ " ρW => tprod ρV ρW
@[simp]
theorem tprod_apply (g : G) : (ρV ⊗ ρW) g = TensorProduct.map (ρV g) (ρW g) :=
rfl
theorem smul_tprod_one_asModule (r : MonoidAlgebra k G) (x : V) (y : W) :
-- Porting note: required to since Lean 4 doesn't unfold asModule
let x' : ρV.asModule := x
let z : (ρV.tprod 1).asModule := x ⊗ₜ y
r • z = (r • x') ⊗ₜ y := by
show asAlgebraHom (ρV ⊗ 1) _ _ = asAlgebraHom ρV _ _ ⊗ₜ _
simp only [asAlgebraHom_def, MonoidAlgebra.lift_apply, tprod_apply, MonoidHom.one_apply,
LinearMap.finsupp_sum_apply, LinearMap.smul_apply, TensorProduct.map_tmul, Module.End.one_apply]
simp only [Finsupp.sum, TensorProduct.sum_tmul]
rfl
theorem smul_one_tprod_asModule (r : MonoidAlgebra k G) (x : V) (y : W) :
-- Porting note: required to since Lean 4 doesn't unfold asModule
let y' : ρW.asModule := y
let z : (1 ⊗ ρW).asModule := x ⊗ₜ y
r • z = x ⊗ₜ (r • y') := by
show asAlgebraHom (1 ⊗ ρW) _ _ = _ ⊗ₜ asAlgebraHom ρW _ _
simp only [asAlgebraHom_def, MonoidAlgebra.lift_apply, tprod_apply, MonoidHom.one_apply,
LinearMap.finsupp_sum_apply, LinearMap.smul_apply, TensorProduct.map_tmul, Module.End.one_apply]
simp only [Finsupp.sum, TensorProduct.tmul_sum, TensorProduct.tmul_smul]
end TensorProduct
section LinearHom
variable {k G V W : Type*} [CommSemiring k] [Group G]
variable [AddCommMonoid V] [Module k V] [AddCommMonoid W] [Module k W]
variable (ρV : Representation k G V) (ρW : Representation k G W)
/-- Given representations of `G` on `V` and `W`, there is a natural representation of `G` on the
module `V →ₗ[k] W`, where `G` acts by conjugation.
-/
def linHom : Representation k G (V →ₗ[k] W) where
toFun g :=
{ toFun := fun f => ρW g ∘ₗ f ∘ₗ ρV g⁻¹
map_add' := fun f₁ f₂ => by simp_rw [add_comp, comp_add]
map_smul' := fun r f => by simp_rw [RingHom.id_apply, smul_comp, comp_smul] }
map_one' := ext fun x => by simp [Module.End.one_eq_id]
map_mul' g h := ext fun x => by simp [Module.End.mul_eq_comp, comp_assoc]
@[simp]
theorem linHom_apply (g : G) (f : V →ₗ[k] W) : (linHom ρV ρW) g f = ρW g ∘ₗ f ∘ₗ ρV g⁻¹ :=
rfl
/-- The dual of a representation `ρ` of `G` on a module `V`, given by `(dual ρ) g f = f ∘ₗ (ρ g⁻¹)`,
where `f : Module.Dual k V`.
-/
def dual : Representation k G (Module.Dual k V) where
toFun g :=
{ toFun := fun f => f ∘ₗ ρV g⁻¹
map_add' := fun f₁ f₂ => by simp only [add_comp]
map_smul' := fun r f => by
ext
simp only [coe_comp, Function.comp_apply, smul_apply, RingHom.id_apply] }
map_one' := by ext; simp
map_mul' g h := by ext; simp
@[simp]
theorem dual_apply (g : G) : (dual ρV) g = Module.Dual.transpose (R := k) (ρV g⁻¹) :=
rfl
/-- Given $k$-modules $V, W$, there is a homomorphism $φ : V^* ⊗ W → Hom_k(V, W)$
(implemented by `dualTensorHom` in `Mathlib.LinearAlgebra.Contraction`).
Given representations of $G$ on $V$ and $W$,there are representations of $G$ on $V^* ⊗ W$ and on
$Hom_k(V, W)$.
This lemma says that $φ$ is $G$-linear.
-/
theorem dualTensorHom_comm (g : G) :
dualTensorHom k V W ∘ₗ TensorProduct.map (ρV.dual g) (ρW g) =
(linHom ρV ρW) g ∘ₗ dualTensorHom k V W := by
ext; simp [Module.Dual.transpose_apply]
end LinearHom
end Representation
| Mathlib/RepresentationTheory/Basic.lean | 500 | 503 | |
/-
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.Data.Matrix.Basis
import Mathlib.Data.Matrix.DMatrix
import Mathlib.LinearAlgebra.Matrix.Determinant.Basic
import Mathlib.LinearAlgebra.Matrix.Reindex
import Mathlib.Tactic.FieldSimp
/-!
# Transvections
Transvections are matrices of the form `1 + stdBasisMatrix i j c`, where `stdBasisMatrix i j c`
is the basic matrix with a `c` at position `(i, j)`. Multiplying by such a transvection on the left
(resp. on the right) amounts to adding `c` times the `j`-th row to the `i`-th row
(resp `c` times the `i`-th column to the `j`-th column). Therefore, they are useful to present
algorithms operating on rows and columns.
Transvections are a special case of *elementary matrices* (according to most references, these also
contain the matrices exchanging rows, and the matrices multiplying a row by a constant).
We show that, over a field, any matrix can be written as `L * D * L'`, where `L` and `L'` are
products of transvections and `D` is diagonal. In other words, one can reduce a matrix to diagonal
form by operations on its rows and columns, a variant of Gauss' pivot algorithm.
## Main definitions and results
* `transvection i j c` is the matrix equal to `1 + stdBasisMatrix i j c`.
* `TransvectionStruct n R` is a structure containing the data of `i, j, c` and a proof that
`i ≠ j`. These are often easier to manipulate than straight matrices, especially in inductive
arguments.
* `exists_list_transvec_mul_diagonal_mul_list_transvec` states that any matrix `M` over a field can
be written in the form `t_1 * ... * t_k * D * t'_1 * ... * t'_l`, where `D` is diagonal and
the `t_i`, `t'_j` are transvections.
* `diagonal_transvection_induction` shows that a property which is true for diagonal matrices and
transvections, and invariant under product, is true for all matrices.
* `diagonal_transvection_induction_of_det_ne_zero` is the same statement over invertible matrices.
## Implementation details
The proof of the reduction results is done inductively on the size of the matrices, reducing an
`(r + 1) × (r + 1)` matrix to a matrix whose last row and column are zeroes, except possibly for
the last diagonal entry. This step is done as follows.
If all the coefficients on the last row and column are zero, there is nothing to do. Otherwise,
one can put a nonzero coefficient in the last diagonal entry by a row or column operation, and then
subtract this last diagonal entry from the other entries in the last row and column to make them
vanish.
This step is done in the type `Fin r ⊕ Unit`, where `Fin r` is useful to choose arbitrarily some
order in which we cancel the coefficients, and the sum structure is useful to use the formalism of
block matrices.
To proceed with the induction, we reindex our matrices to reduce to the above situation.
-/
universe u₁ u₂
namespace Matrix
variable (n p : Type*) (R : Type u₂) {𝕜 : Type*} [Field 𝕜]
variable [DecidableEq n] [DecidableEq p]
variable [CommRing R]
section Transvection
variable {R n} (i j : n)
/-- The transvection matrix `transvection i j c` is equal to the identity plus `c` at position
`(i, j)`. Multiplying by it on the left (as in `transvection i j c * M`) corresponds to adding
`c` times the `j`-th row of `M` to its `i`-th row. Multiplying by it on the right corresponds
to adding `c` times the `i`-th column to the `j`-th column. -/
def transvection (c : R) : Matrix n n R :=
1 + Matrix.stdBasisMatrix i j c
@[simp]
theorem transvection_zero : transvection i j (0 : R) = 1 := by simp [transvection]
section
/-- A transvection matrix is obtained from the identity by adding `c` times the `j`-th row to
the `i`-th row. -/
theorem updateRow_eq_transvection [Finite n] (c : R) :
updateRow (1 : Matrix n n R) i ((1 : Matrix n n R) i + c • (1 : Matrix n n R) j) =
transvection i j c := by
cases nonempty_fintype n
ext a b
by_cases ha : i = a
· by_cases hb : j = b
· simp only [ha, updateRow_self, Pi.add_apply, one_apply, Pi.smul_apply, hb, ↓reduceIte,
smul_eq_mul, mul_one, transvection, add_apply, StdBasisMatrix.apply_same]
· simp only [ha, updateRow_self, Pi.add_apply, one_apply, Pi.smul_apply, hb, ↓reduceIte,
smul_eq_mul, mul_zero, add_zero, transvection, add_apply, and_false, not_false_eq_true,
StdBasisMatrix.apply_of_ne]
· simp only [updateRow_ne, transvection, ha, Ne.symm ha, StdBasisMatrix.apply_of_ne, add_zero,
Algebra.id.smul_eq_mul, Ne, not_false_iff, DMatrix.add_apply, Pi.smul_apply,
mul_zero, false_and, add_apply]
variable [Fintype n]
theorem transvection_mul_transvection_same (h : i ≠ j) (c d : R) :
transvection i j c * transvection i j d = transvection i j (c + d) := by
simp [transvection, Matrix.add_mul, Matrix.mul_add, h, h.symm, add_smul, add_assoc,
stdBasisMatrix_add]
@[simp]
theorem transvection_mul_apply_same (b : n) (c : R) (M : Matrix n n R) :
(transvection i j c * M) i b = M i b + c * M j b := by simp [transvection, Matrix.add_mul]
@[simp]
theorem mul_transvection_apply_same (a : n) (c : R) (M : Matrix n n R) :
(M * transvection i j c) a j = M a j + c * M a i := by
simp [transvection, Matrix.mul_add, mul_comm]
@[simp]
theorem transvection_mul_apply_of_ne (a b : n) (ha : a ≠ i) (c : R) (M : Matrix n n R) :
(transvection i j c * M) a b = M a b := by simp [transvection, Matrix.add_mul, ha]
@[simp]
theorem mul_transvection_apply_of_ne (a b : n) (hb : b ≠ j) (c : R) (M : Matrix n n R) :
(M * transvection i j c) a b = M a b := by simp [transvection, Matrix.mul_add, hb]
@[simp]
theorem det_transvection_of_ne (h : i ≠ j) (c : R) : det (transvection i j c) = 1 := by
rw [← updateRow_eq_transvection i j, det_updateRow_add_smul_self _ h, det_one]
end
variable (R n)
/-- A structure containing all the information from which one can build a nontrivial transvection.
This structure is easier to manipulate than transvections as one has a direct access to all the
relevant fields. -/
structure TransvectionStruct where
(i j : n)
hij : i ≠ j
c : R
instance [Nontrivial n] : Nonempty (TransvectionStruct n R) := by
choose x y hxy using exists_pair_ne n
exact ⟨⟨x, y, hxy, 0⟩⟩
namespace TransvectionStruct
variable {R n}
/-- Associating to a `transvection_struct` the corresponding transvection matrix. -/
def toMatrix (t : TransvectionStruct n R) : Matrix n n R :=
transvection t.i t.j t.c
@[simp]
theorem toMatrix_mk (i j : n) (hij : i ≠ j) (c : R) :
TransvectionStruct.toMatrix ⟨i, j, hij, c⟩ = transvection i j c :=
rfl
@[simp]
protected theorem det [Fintype n] (t : TransvectionStruct n R) : det t.toMatrix = 1 :=
det_transvection_of_ne _ _ t.hij _
@[simp]
theorem det_toMatrix_prod [Fintype n] (L : List (TransvectionStruct n 𝕜)) :
det (L.map toMatrix).prod = 1 := by
induction L with
| nil => simp
| cons _ _ IH => simp [IH]
/-- The inverse of a `TransvectionStruct`, designed so that `t.inv.toMatrix` is the inverse of
`t.toMatrix`. -/
@[simps]
protected def inv (t : TransvectionStruct n R) : TransvectionStruct n R where
i := t.i
j := t.j
hij := t.hij
c := -t.c
section
variable [Fintype n]
theorem inv_mul (t : TransvectionStruct n R) : t.inv.toMatrix * t.toMatrix = 1 := by
rcases t with ⟨_, _, t_hij⟩
simp [toMatrix, transvection_mul_transvection_same, t_hij]
theorem mul_inv (t : TransvectionStruct n R) : t.toMatrix * t.inv.toMatrix = 1 := by
rcases t with ⟨_, _, t_hij⟩
simp [toMatrix, transvection_mul_transvection_same, t_hij]
theorem reverse_inv_prod_mul_prod (L : List (TransvectionStruct n R)) :
(L.reverse.map (toMatrix ∘ TransvectionStruct.inv)).prod * (L.map toMatrix).prod = 1 := by
induction L with
| nil => simp
| cons t L IH =>
suffices
(L.reverse.map (toMatrix ∘ TransvectionStruct.inv)).prod * (t.inv.toMatrix * t.toMatrix) *
(L.map toMatrix).prod = 1
by simpa [Matrix.mul_assoc]
simpa [inv_mul] using IH
theorem prod_mul_reverse_inv_prod (L : List (TransvectionStruct n R)) :
(L.map toMatrix).prod * (L.reverse.map (toMatrix ∘ TransvectionStruct.inv)).prod = 1 := by
induction L with
| nil => simp
| cons t L IH =>
suffices
t.toMatrix *
((L.map toMatrix).prod * (L.reverse.map (toMatrix ∘ TransvectionStruct.inv)).prod) *
t.inv.toMatrix = 1
by simpa [Matrix.mul_assoc]
simp_rw [IH, Matrix.mul_one, t.mul_inv]
/-- `M` is a scalar matrix if it commutes with every nontrivial transvection (elementary matrix). -/
theorem _root_.Matrix.mem_range_scalar_of_commute_transvectionStruct {M : Matrix n n R}
(hM : ∀ t : TransvectionStruct n R, Commute t.toMatrix M) :
M ∈ Set.range (Matrix.scalar n) := by
refine mem_range_scalar_of_commute_stdBasisMatrix ?_
intro i j hij
simpa [transvection, mul_add, add_mul] using (hM ⟨i, j, hij, 1⟩).eq
theorem _root_.Matrix.mem_range_scalar_iff_commute_transvectionStruct {M : Matrix n n R} :
M ∈ Set.range (Matrix.scalar n) ↔ ∀ t : TransvectionStruct n R, Commute t.toMatrix M := by
refine ⟨fun h t => ?_, mem_range_scalar_of_commute_transvectionStruct⟩
rw [mem_range_scalar_iff_commute_stdBasisMatrix] at h
refine (Commute.one_left M).add_left ?_
convert (h _ _ t.hij).smul_left t.c using 1
rw [smul_stdBasisMatrix, smul_eq_mul, mul_one]
end
open Sum
/-- Given a `TransvectionStruct` on `n`, define the corresponding `TransvectionStruct` on `n ⊕ p`
using the identity on `p`. -/
def sumInl (t : TransvectionStruct n R) : TransvectionStruct (n ⊕ p) R where
i := inl t.i
j := inl t.j
hij := by simp [t.hij]
c := t.c
theorem toMatrix_sumInl (t : TransvectionStruct n R) :
(t.sumInl p).toMatrix = fromBlocks t.toMatrix 0 0 1 := by
cases t
ext a b
rcases a with a | a <;> rcases b with b | b
· by_cases h : a = b <;> simp [TransvectionStruct.sumInl, transvection, h, stdBasisMatrix]
· simp [TransvectionStruct.sumInl, transvection]
· simp [TransvectionStruct.sumInl, transvection]
· by_cases h : a = b <;> simp [TransvectionStruct.sumInl, transvection, h]
@[simp]
theorem sumInl_toMatrix_prod_mul [Fintype n] [Fintype p] (M : Matrix n n R)
(L : List (TransvectionStruct n R)) (N : Matrix p p R) :
(L.map (toMatrix ∘ sumInl p)).prod * fromBlocks M 0 0 N =
fromBlocks ((L.map toMatrix).prod * M) 0 0 N := by
induction L with
| nil => simp
| cons t L IH => simp [Matrix.mul_assoc, IH, toMatrix_sumInl, fromBlocks_multiply]
@[simp]
theorem mul_sumInl_toMatrix_prod [Fintype n] [Fintype p] (M : Matrix n n R)
(L : List (TransvectionStruct n R)) (N : Matrix p p R) :
fromBlocks M 0 0 N * (L.map (toMatrix ∘ sumInl p)).prod =
fromBlocks (M * (L.map toMatrix).prod) 0 0 N := by
induction L generalizing M N with
| nil => simp
| cons t L IH => simp [IH, toMatrix_sumInl, fromBlocks_multiply]
variable {p}
/-- Given a `TransvectionStruct` on `n` and an equivalence between `n` and `p`, define the
corresponding `TransvectionStruct` on `p`. -/
def reindexEquiv (e : n ≃ p) (t : TransvectionStruct n R) : TransvectionStruct p R where
i := e t.i
j := e t.j
hij := by simp [t.hij]
c := t.c
variable [Fintype n] [Fintype p]
theorem toMatrix_reindexEquiv (e : n ≃ p) (t : TransvectionStruct n R) :
(t.reindexEquiv e).toMatrix = reindexAlgEquiv R _ e t.toMatrix := by
rcases t with ⟨t_i, t_j, _⟩
ext a b
simp only [reindexEquiv, transvection, mul_boole, Algebra.id.smul_eq_mul, toMatrix_mk,
submatrix_apply, reindex_apply, DMatrix.add_apply, Pi.smul_apply, reindexAlgEquiv_apply]
by_cases ha : e t_i = a <;> by_cases hb : e t_j = b <;> by_cases hab : a = b <;>
simp [ha, hb, hab, ← e.apply_eq_iff_eq_symm_apply, stdBasisMatrix]
theorem toMatrix_reindexEquiv_prod (e : n ≃ p) (L : List (TransvectionStruct n R)) :
(L.map (toMatrix ∘ reindexEquiv e)).prod = reindexAlgEquiv R _ e (L.map toMatrix).prod := by
induction L with
| nil => simp
| cons t L IH =>
simp only [toMatrix_reindexEquiv, IH, Function.comp_apply, List.prod_cons,
reindexAlgEquiv_apply, List.map]
exact (reindexAlgEquiv_mul R _ _ _ _).symm
end TransvectionStruct
end Transvection
/-!
# Reducing matrices by left and right multiplication by transvections
In this section, we show that any matrix can be reduced to diagonal form by left and right
multiplication by transvections (or, equivalently, by elementary operations on lines and columns).
The main step is to kill the last row and column of a matrix in `Fin r ⊕ Unit` with nonzero last
coefficient, by subtracting this coefficient from the other ones. The list of these operations is
recorded in `list_transvec_col M` and `list_transvec_row M`. We have to analyze inductively how
these operations affect the coefficients in the last row and the last column to conclude that they
have the desired effect.
Once this is done, one concludes the reduction by induction on the size
of the matrices, through a suitable reindexing to identify any fintype with `Fin r ⊕ Unit`.
-/
|
namespace Pivot
variable {R} {r : ℕ} (M : Matrix (Fin r ⊕ Unit) (Fin r ⊕ Unit) 𝕜)
open Unit Sum Fin TransvectionStruct
| Mathlib/LinearAlgebra/Matrix/Transvection.lean | 321 | 327 |
/-
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.ConcreteCategory
import Mathlib.Algebra.Category.ModuleCat.Colimits
/-!
# Homology and exactness of short complexes of modules
In this file, the homology of a short complex `S` of abelian groups is identified
with the quotient of `LinearMap.ker S.g` by the image of the morphism
`S.moduleCatToCycles : S.X₁ →ₗ[R] LinearMap.ker S.g` induced by `S.f`.
-/
universe v u
variable {R : Type u} [Ring R]
namespace CategoryTheory
open Limits
namespace ShortComplex
noncomputable instance : (forget₂ (ModuleCat.{v} R) Ab).PreservesHomology where
/-- Constructor for short complexes in `ModuleCat.{v} R` taking as inputs
linear maps `f` and `g` and the vanishing of their composition. -/
@[simps]
def moduleCatMk {X₁ X₂ X₃ : Type v} [AddCommGroup X₁] [AddCommGroup X₂] [AddCommGroup X₃]
[Module R X₁] [Module R X₂] [Module R X₃] (f : X₁ →ₗ[R] X₂) (g : X₂ →ₗ[R] X₃)
(hfg : g.comp f = 0) : ShortComplex (ModuleCat.{v} R) :=
ShortComplex.mk (ModuleCat.ofHom f) (ModuleCat.ofHom g) (ModuleCat.hom_ext hfg)
variable (S : ShortComplex (ModuleCat.{v} R))
@[simp]
lemma moduleCat_zero_apply (x : S.X₁) : S.g (S.f x) = 0 :=
S.zero_apply x
lemma moduleCat_exact_iff :
S.Exact ↔ ∀ (x₂ : S.X₂) (_ : S.g x₂ = 0), ∃ (x₁ : S.X₁), S.f x₁ = x₂ :=
S.exact_iff_of_hasForget
lemma moduleCat_exact_iff_ker_sub_range :
S.Exact ↔ LinearMap.ker S.g.hom ≤ LinearMap.range S.f.hom := by
rw [moduleCat_exact_iff]
aesop
lemma moduleCat_exact_iff_range_eq_ker :
S.Exact ↔ LinearMap.range S.f.hom = LinearMap.ker S.g.hom := by
rw [moduleCat_exact_iff_ker_sub_range]
aesop
variable {S}
lemma Exact.moduleCat_range_eq_ker (hS : S.Exact) :
LinearMap.range S.f.hom = LinearMap.ker S.g.hom := by
simpa only [moduleCat_exact_iff_range_eq_ker] using hS
lemma ShortExact.moduleCat_injective_f (hS : S.ShortExact) :
Function.Injective S.f :=
hS.injective_f
lemma ShortExact.moduleCat_surjective_g (hS : S.ShortExact) :
Function.Surjective S.g :=
hS.surjective_g
variable (S)
lemma ShortExact.moduleCat_exact_iff_function_exact :
S.Exact ↔ Function.Exact S.f S.g := by
rw [moduleCat_exact_iff_range_eq_ker, LinearMap.exact_iff]
tauto
/-- Constructor for short complexes in `ModuleCat.{v} R` taking as inputs
morphisms `f` and `g` and the assumption `LinearMap.range f ≤ LinearMap.ker g`. -/
@[simps]
def moduleCatMkOfKerLERange {X₁ X₂ X₃ : ModuleCat.{v} R} (f : X₁ ⟶ X₂) (g : X₂ ⟶ X₃)
(hfg : LinearMap.range f.hom ≤ LinearMap.ker g.hom) : ShortComplex (ModuleCat.{v} R) :=
ShortComplex.mk f g (by aesop)
lemma Exact.moduleCat_of_range_eq_ker {X₁ X₂ X₃ : ModuleCat.{v} R}
(f : X₁ ⟶ X₂) (g : X₂ ⟶ X₃) (hfg : LinearMap.range f.hom = LinearMap.ker g.hom) :
(moduleCatMkOfKerLERange f g (by rw [hfg])).Exact := by
simpa only [moduleCat_exact_iff_range_eq_ker] using hfg
/-- The canonical linear map `S.X₁ →ₗ[R] LinearMap.ker S.g` induced by `S.f`. -/
@[simps]
def moduleCatToCycles : S.X₁ →ₗ[R] LinearMap.ker S.g.hom where
toFun x := ⟨S.f x, S.moduleCat_zero_apply x⟩
map_add' x y := by aesop
map_smul' a x := by aesop
/-- The homology of `S`, defined as the quotient of the kernel of `S.g` by
the image of `S.moduleCatToCycles` -/
abbrev moduleCatHomology :=
ModuleCat.of R (LinearMap.ker S.g.hom ⧸ LinearMap.range S.moduleCatToCycles)
/-- The canonical map `ModuleCat.of R (LinearMap.ker S.g) ⟶ S.moduleCatHomology`. -/
abbrev moduleCatHomologyπ : ModuleCat.of R (LinearMap.ker S.g.hom) ⟶ S.moduleCatHomology :=
ModuleCat.ofHom (LinearMap.range S.moduleCatToCycles).mkQ
/-- The explicit left homology data of a short complex of modules that is
given by a kernel and a quotient given by the `LinearMap` API. -/
@[simps K H i π]
def moduleCatLeftHomologyData : S.LeftHomologyData where
K := ModuleCat.of R (LinearMap.ker S.g.hom)
H := S.moduleCatHomology
i := ModuleCat.ofHom (LinearMap.ker S.g.hom).subtype
π := S.moduleCatHomologyπ
wi := by aesop
hi := ModuleCat.kernelIsLimit _
wπ := by aesop
hπ := ModuleCat.cokernelIsColimit (ModuleCat.ofHom S.moduleCatToCycles)
@[simp]
lemma moduleCatLeftHomologyData_f' :
S.moduleCatLeftHomologyData.f' = ModuleCat.ofHom S.moduleCatToCycles := rfl
instance : Epi S.moduleCatHomologyπ :=
(inferInstance : Epi S.moduleCatLeftHomologyData.π)
/-- Given a short complex `S` of modules, this is the isomorphism between
the abstract `S.cycles` of the homology API and the more concrete description as
`LinearMap.ker S.g`. -/
noncomputable def moduleCatCyclesIso : S.cycles ≅ ModuleCat.of R (LinearMap.ker S.g.hom) :=
S.moduleCatLeftHomologyData.cyclesIso
@[reassoc (attr := simp, elementwise)]
lemma moduleCatCyclesIso_hom_subtype :
S.moduleCatCyclesIso.hom ≫ ModuleCat.ofHom (LinearMap.ker S.g.hom).subtype = S.iCycles :=
S.moduleCatLeftHomologyData.cyclesIso_hom_comp_i
@[reassoc (attr := simp, elementwise)]
lemma moduleCatCyclesIso_inv_iCycles :
S.moduleCatCyclesIso.inv ≫ S.iCycles = ModuleCat.ofHom (LinearMap.ker S.g.hom).subtype :=
S.moduleCatLeftHomologyData.cyclesIso_inv_comp_iCycles
@[reassoc (attr := simp, elementwise)]
lemma toCycles_moduleCatCyclesIso_hom :
S.toCycles ≫ S.moduleCatCyclesIso.hom = ModuleCat.ofHom S.moduleCatToCycles := by
rw [← cancel_mono S.moduleCatLeftHomologyData.i, moduleCatLeftHomologyData_i,
Category.assoc, S.moduleCatCyclesIso_hom_subtype, toCycles_i]
rfl
/-- Given a short complex `S` of modules, this is the isomorphism between
the abstract `S.homology` of the homology API and the more explicit
quotient of `LinearMap.ker S.g` by the image of
`S.moduleCatToCycles : S.X₁ →ₗ[R] LinearMap.ker S.g`. -/
noncomputable def moduleCatHomologyIso :
S.homology ≅ S.moduleCatHomology :=
S.moduleCatLeftHomologyData.homologyIso
@[reassoc (attr := simp, elementwise)]
lemma π_moduleCatCyclesIso_hom :
S.homologyπ ≫ S.moduleCatHomologyIso.hom =
| S.moduleCatCyclesIso.hom ≫ S.moduleCatHomologyπ :=
S.moduleCatLeftHomologyData.homologyπ_comp_homologyIso_hom
@[reassoc (attr := simp, elementwise)]
lemma moduleCatCyclesIso_inv_π :
S.moduleCatCyclesIso.inv ≫ S.homologyπ =
| Mathlib/Algebra/Homology/ShortComplex/ModuleCat.lean | 161 | 166 |
/-
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.Group.Submonoid.Operations
import Mathlib.Algebra.MonoidAlgebra.Defs
import Mathlib.Algebra.Order.Monoid.Unbundled.WithTop
import Mathlib.Algebra.Ring.Action.Rat
import Mathlib.Data.Finset.Sort
import Mathlib.Tactic.FastInstance
/-!
# Theory of univariate polynomials
This file defines `Polynomial R`, the type of univariate polynomials over the semiring `R`, builds
a semiring structure on it, and gives basic definitions that are expanded in other files in this
directory.
## Main definitions
* `monomial n a` is the polynomial `a X^n`. Note that `monomial n` is defined as an `R`-linear map.
* `C a` is the constant polynomial `a`. Note that `C` is defined as a ring homomorphism.
* `X` is the polynomial `X`, i.e., `monomial 1 1`.
* `p.sum f` is `∑ n ∈ p.support, f n (p.coeff n)`, i.e., one sums the values of functions applied
to coefficients of the polynomial `p`.
* `p.erase n` is the polynomial `p` in which one removes the `c X^n` term.
There are often two natural variants of lemmas involving sums, depending on whether one acts on the
polynomials, or on the function. The naming convention is that one adds `index` when acting on
the polynomials. For instance,
* `sum_add_index` states that `(p + q).sum f = p.sum f + q.sum f`;
* `sum_add` states that `p.sum (fun n x ↦ f n x + g n x) = p.sum f + p.sum g`.
* Notation to refer to `Polynomial R`, as `R[X]` or `R[t]`.
## Implementation
Polynomials are defined using `R[ℕ]`, where `R` is a semiring.
The variable `X` commutes with every polynomial `p`: lemma `X_mul` proves the identity
`X * p = p * X`. The relationship to `R[ℕ]` is through a structure
to make polynomials irreducible from the point of view of the kernel. Most operations
are irreducible since Lean can not compute anyway with `AddMonoidAlgebra`. There are two
exceptions that we make semireducible:
* The zero polynomial, so that its coefficients are definitionally equal to `0`.
* The scalar action, to permit typeclass search to unfold it to resolve potential instance
diamonds.
The raw implementation of the equivalence between `R[X]` and `R[ℕ]` is
done through `ofFinsupp` and `toFinsupp` (or, equivalently, `rcases p` when `p` is a polynomial
gives an element `q` of `R[ℕ]`, and conversely `⟨q⟩` gives back `p`). The
equivalence is also registered as a ring equiv in `Polynomial.toFinsuppIso`. These should
in general not be used once the basic API for polynomials is constructed.
-/
noncomputable section
/-- `Polynomial R` is the type of univariate polynomials over `R`,
denoted as `R[X]` within the `Polynomial` namespace.
Polynomials should be seen as (semi-)rings with the additional constructor `X`.
The embedding from `R` is called `C`. -/
structure Polynomial (R : Type*) [Semiring R] where ofFinsupp ::
toFinsupp : AddMonoidAlgebra R ℕ
@[inherit_doc] scoped[Polynomial] notation:9000 R "[X]" => Polynomial R
open AddMonoidAlgebra Finset
open Finsupp hiding single
open Function hiding Commute
namespace Polynomial
universe u
variable {R : Type u} {a b : R} {m n : ℕ}
section Semiring
variable [Semiring R] {p q : R[X]}
theorem forall_iff_forall_finsupp (P : R[X] → Prop) :
(∀ p, P p) ↔ ∀ q : R[ℕ], P ⟨q⟩ :=
⟨fun h q => h ⟨q⟩, fun h ⟨p⟩ => h p⟩
theorem exists_iff_exists_finsupp (P : R[X] → Prop) :
(∃ p, P p) ↔ ∃ q : R[ℕ], P ⟨q⟩ :=
⟨fun ⟨⟨p⟩, hp⟩ => ⟨p, hp⟩, fun ⟨q, hq⟩ => ⟨⟨q⟩, hq⟩⟩
@[simp]
theorem eta (f : R[X]) : Polynomial.ofFinsupp f.toFinsupp = f := by cases f; rfl
/-! ### Conversions to and from `AddMonoidAlgebra`
Since `R[X]` is not defeq to `R[ℕ]`, but instead is a structure wrapping
it, we have to copy across all the arithmetic operators manually, along with the lemmas about how
they unfold around `Polynomial.ofFinsupp` and `Polynomial.toFinsupp`.
-/
section AddMonoidAlgebra
private irreducible_def add : R[X] → R[X] → R[X]
| ⟨a⟩, ⟨b⟩ => ⟨a + b⟩
private irreducible_def neg {R : Type u} [Ring R] : R[X] → R[X]
| ⟨a⟩ => ⟨-a⟩
private irreducible_def mul : R[X] → R[X] → R[X]
| ⟨a⟩, ⟨b⟩ => ⟨a * b⟩
instance zero : Zero R[X] :=
⟨⟨0⟩⟩
instance one : One R[X] :=
⟨⟨1⟩⟩
instance add' : Add R[X] :=
⟨add⟩
instance neg' {R : Type u} [Ring R] : Neg R[X] :=
⟨neg⟩
instance sub {R : Type u} [Ring R] : Sub R[X] :=
⟨fun a b => a + -b⟩
instance mul' : Mul R[X] :=
⟨mul⟩
-- If the private definitions are accidentally exposed, simplify them away.
@[simp] theorem add_eq_add : add p q = p + q := rfl
@[simp] theorem mul_eq_mul : mul p q = p * q := rfl
instance instNSMul : SMul ℕ R[X] where
smul r p := ⟨r • p.toFinsupp⟩
instance smulZeroClass {S : Type*} [SMulZeroClass S R] : SMulZeroClass S R[X] where
smul r p := ⟨r • p.toFinsupp⟩
smul_zero a := congr_arg ofFinsupp (smul_zero a)
instance {S : Type*} [Zero S] [SMulZeroClass S R] [NoZeroSMulDivisors S R] :
NoZeroSMulDivisors S R[X] where
eq_zero_or_eq_zero_of_smul_eq_zero eq :=
(eq_zero_or_eq_zero_of_smul_eq_zero <| congr_arg toFinsupp eq).imp id (congr_arg ofFinsupp)
-- to avoid a bug in the `ring` tactic
instance (priority := 1) pow : Pow R[X] ℕ where pow p n := npowRec n p
@[simp]
theorem ofFinsupp_zero : (⟨0⟩ : R[X]) = 0 :=
rfl
@[simp]
theorem ofFinsupp_one : (⟨1⟩ : R[X]) = 1 :=
rfl
@[simp]
theorem ofFinsupp_add {a b} : (⟨a + b⟩ : R[X]) = ⟨a⟩ + ⟨b⟩ :=
show _ = add _ _ by rw [add_def]
@[simp]
theorem ofFinsupp_neg {R : Type u} [Ring R] {a} : (⟨-a⟩ : R[X]) = -⟨a⟩ :=
show _ = neg _ by rw [neg_def]
@[simp]
theorem ofFinsupp_sub {R : Type u} [Ring R] {a b} : (⟨a - b⟩ : R[X]) = ⟨a⟩ - ⟨b⟩ := by
rw [sub_eq_add_neg, ofFinsupp_add, ofFinsupp_neg]
rfl
@[simp]
theorem ofFinsupp_mul (a b) : (⟨a * b⟩ : R[X]) = ⟨a⟩ * ⟨b⟩ :=
show _ = mul _ _ by rw [mul_def]
@[simp]
theorem ofFinsupp_nsmul (a : ℕ) (b) :
(⟨a • b⟩ : R[X]) = (a • ⟨b⟩ : R[X]) :=
rfl
@[simp]
theorem ofFinsupp_smul {S : Type*} [SMulZeroClass S R] (a : S) (b) :
(⟨a • b⟩ : R[X]) = (a • ⟨b⟩ : R[X]) :=
rfl
@[simp]
theorem ofFinsupp_pow (a) (n : ℕ) : (⟨a ^ n⟩ : R[X]) = ⟨a⟩ ^ n := by
change _ = npowRec n _
induction n with
| zero => simp [npowRec]
| succ n n_ih => simp [npowRec, n_ih, pow_succ]
@[simp]
theorem toFinsupp_zero : (0 : R[X]).toFinsupp = 0 :=
rfl
@[simp]
theorem toFinsupp_one : (1 : R[X]).toFinsupp = 1 :=
rfl
@[simp]
theorem toFinsupp_add (a b : R[X]) : (a + b).toFinsupp = a.toFinsupp + b.toFinsupp := by
cases a
cases b
rw [← ofFinsupp_add]
@[simp]
theorem toFinsupp_neg {R : Type u} [Ring R] (a : R[X]) : (-a).toFinsupp = -a.toFinsupp := by
cases a
rw [← ofFinsupp_neg]
@[simp]
theorem toFinsupp_sub {R : Type u} [Ring R] (a b : R[X]) :
(a - b).toFinsupp = a.toFinsupp - b.toFinsupp := by
rw [sub_eq_add_neg, ← toFinsupp_neg, ← toFinsupp_add]
rfl
@[simp]
theorem toFinsupp_mul (a b : R[X]) : (a * b).toFinsupp = a.toFinsupp * b.toFinsupp := by
cases a
cases b
rw [← ofFinsupp_mul]
@[simp]
theorem toFinsupp_nsmul (a : ℕ) (b : R[X]) :
(a • b).toFinsupp = a • b.toFinsupp :=
rfl
@[simp]
theorem toFinsupp_smul {S : Type*} [SMulZeroClass S R] (a : S) (b : R[X]) :
(a • b).toFinsupp = a • b.toFinsupp :=
rfl
@[simp]
theorem toFinsupp_pow (a : R[X]) (n : ℕ) : (a ^ n).toFinsupp = a.toFinsupp ^ n := by
cases a
rw [← ofFinsupp_pow]
theorem _root_.IsSMulRegular.polynomial {S : Type*} [SMulZeroClass S R] {a : S}
(ha : IsSMulRegular R a) : IsSMulRegular R[X] a
| ⟨_x⟩, ⟨_y⟩, h => congr_arg _ <| ha.finsupp (Polynomial.ofFinsupp.inj h)
theorem toFinsupp_injective : Function.Injective (toFinsupp : R[X] → AddMonoidAlgebra _ _) :=
fun ⟨_x⟩ ⟨_y⟩ => congr_arg _
@[simp]
theorem toFinsupp_inj {a b : R[X]} : a.toFinsupp = b.toFinsupp ↔ a = b :=
toFinsupp_injective.eq_iff
@[simp]
theorem toFinsupp_eq_zero {a : R[X]} : a.toFinsupp = 0 ↔ a = 0 := by
rw [← toFinsupp_zero, toFinsupp_inj]
@[simp]
theorem toFinsupp_eq_one {a : R[X]} : a.toFinsupp = 1 ↔ a = 1 := by
rw [← toFinsupp_one, toFinsupp_inj]
/-- A more convenient spelling of `Polynomial.ofFinsupp.injEq` in terms of `Iff`. -/
theorem ofFinsupp_inj {a b} : (⟨a⟩ : R[X]) = ⟨b⟩ ↔ a = b :=
iff_of_eq (ofFinsupp.injEq _ _)
@[simp]
theorem ofFinsupp_eq_zero {a} : (⟨a⟩ : R[X]) = 0 ↔ a = 0 := by
rw [← ofFinsupp_zero, ofFinsupp_inj]
@[simp]
theorem ofFinsupp_eq_one {a} : (⟨a⟩ : R[X]) = 1 ↔ a = 1 := by rw [← ofFinsupp_one, ofFinsupp_inj]
instance inhabited : Inhabited R[X] :=
⟨0⟩
instance instNatCast : NatCast R[X] where natCast n := ofFinsupp n
@[simp]
theorem ofFinsupp_natCast (n : ℕ) : (⟨n⟩ : R[X]) = n := rfl
@[simp]
theorem toFinsupp_natCast (n : ℕ) : (n : R[X]).toFinsupp = n := rfl
@[simp]
theorem ofFinsupp_ofNat (n : ℕ) [n.AtLeastTwo] : (⟨ofNat(n)⟩ : R[X]) = ofNat(n) := rfl
@[simp]
theorem toFinsupp_ofNat (n : ℕ) [n.AtLeastTwo] : (ofNat(n) : R[X]).toFinsupp = ofNat(n) := rfl
instance semiring : Semiring R[X] :=
fast_instance% Function.Injective.semiring toFinsupp toFinsupp_injective toFinsupp_zero
toFinsupp_one toFinsupp_add toFinsupp_mul (fun _ _ => toFinsupp_nsmul _ _) toFinsupp_pow
fun _ => rfl
instance distribSMul {S} [DistribSMul S R] : DistribSMul S R[X] :=
fast_instance% Function.Injective.distribSMul ⟨⟨toFinsupp, toFinsupp_zero⟩, toFinsupp_add⟩
toFinsupp_injective toFinsupp_smul
instance distribMulAction {S} [Monoid S] [DistribMulAction S R] : DistribMulAction S R[X] :=
fast_instance% Function.Injective.distribMulAction
⟨⟨toFinsupp, toFinsupp_zero (R := R)⟩, toFinsupp_add⟩ toFinsupp_injective toFinsupp_smul
instance faithfulSMul {S} [SMulZeroClass S R] [FaithfulSMul S R] : FaithfulSMul S R[X] where
eq_of_smul_eq_smul {_s₁ _s₂} h :=
eq_of_smul_eq_smul fun a : ℕ →₀ R => congr_arg toFinsupp (h ⟨a⟩)
instance module {S} [Semiring S] [Module S R] : Module S R[X] :=
fast_instance% Function.Injective.module _ ⟨⟨toFinsupp, toFinsupp_zero⟩, toFinsupp_add⟩
toFinsupp_injective toFinsupp_smul
instance smulCommClass {S₁ S₂} [SMulZeroClass S₁ R] [SMulZeroClass S₂ R] [SMulCommClass S₁ S₂ R] :
SMulCommClass S₁ S₂ R[X] :=
⟨by
rintro m n ⟨f⟩
simp_rw [← ofFinsupp_smul, smul_comm m n f]⟩
instance isScalarTower {S₁ S₂} [SMul S₁ S₂] [SMulZeroClass S₁ R] [SMulZeroClass S₂ R]
[IsScalarTower S₁ S₂ R] : IsScalarTower S₁ S₂ R[X] :=
⟨by
rintro _ _ ⟨⟩
simp_rw [← ofFinsupp_smul, smul_assoc]⟩
instance isScalarTower_right {α K : Type*} [Semiring K] [DistribSMul α K] [IsScalarTower α K K] :
IsScalarTower α K[X] K[X] :=
⟨by
rintro _ ⟨⟩ ⟨⟩
simp_rw [smul_eq_mul, ← ofFinsupp_smul, ← ofFinsupp_mul, ← ofFinsupp_smul, smul_mul_assoc]⟩
instance isCentralScalar {S} [SMulZeroClass S R] [SMulZeroClass Sᵐᵒᵖ R] [IsCentralScalar S R] :
IsCentralScalar S R[X] :=
⟨by
rintro _ ⟨⟩
simp_rw [← ofFinsupp_smul, op_smul_eq_smul]⟩
instance unique [Subsingleton R] : Unique R[X] :=
{ Polynomial.inhabited with
uniq := by
rintro ⟨x⟩
apply congr_arg ofFinsupp
simp [eq_iff_true_of_subsingleton] }
variable (R)
/-- Ring isomorphism between `R[X]` and `R[ℕ]`. This is just an
implementation detail, but it can be useful to transfer results from `Finsupp` to polynomials. -/
@[simps apply symm_apply]
def toFinsuppIso : R[X] ≃+* R[ℕ] where
toFun := toFinsupp
invFun := ofFinsupp
left_inv := fun ⟨_p⟩ => rfl
right_inv _p := rfl
map_mul' := toFinsupp_mul
map_add' := toFinsupp_add
instance [DecidableEq R] : DecidableEq R[X] :=
@Equiv.decidableEq R[X] _ (toFinsuppIso R).toEquiv (Finsupp.instDecidableEq)
/-- Linear isomorphism between `R[X]` and `R[ℕ]`. This is just an
implementation detail, but it can be useful to transfer results from `Finsupp` to polynomials. -/
@[simps!]
def toFinsuppIsoLinear : R[X] ≃ₗ[R] R[ℕ] where
__ := toFinsuppIso R
map_smul' _ _ := rfl
end AddMonoidAlgebra
theorem ofFinsupp_sum {ι : Type*} (s : Finset ι) (f : ι → R[ℕ]) :
(⟨∑ i ∈ s, f i⟩ : R[X]) = ∑ i ∈ s, ⟨f i⟩ :=
map_sum (toFinsuppIso R).symm f s
theorem toFinsupp_sum {ι : Type*} (s : Finset ι) (f : ι → R[X]) :
(∑ i ∈ s, f i : R[X]).toFinsupp = ∑ i ∈ s, (f i).toFinsupp :=
map_sum (toFinsuppIso R) f s
/-- The set of all `n` such that `X^n` has a non-zero coefficient. -/
def support : R[X] → Finset ℕ
| ⟨p⟩ => p.support
@[simp]
theorem support_ofFinsupp (p) : support (⟨p⟩ : R[X]) = p.support := by rw [support]
theorem support_toFinsupp (p : R[X]) : p.toFinsupp.support = p.support := by rw [support]
@[simp]
theorem support_zero : (0 : R[X]).support = ∅ :=
rfl
@[simp]
theorem support_eq_empty : p.support = ∅ ↔ p = 0 := by
rcases p with ⟨⟩
simp [support]
@[simp] lemma support_nonempty : p.support.Nonempty ↔ p ≠ 0 :=
Finset.nonempty_iff_ne_empty.trans support_eq_empty.not
theorem card_support_eq_zero : #p.support = 0 ↔ p = 0 := by simp
/-- `monomial s a` is the monomial `a * X^s` -/
def monomial (n : ℕ) : R →ₗ[R] R[X] where
toFun t := ⟨Finsupp.single n t⟩
-- Porting note (https://github.com/leanprover-community/mathlib4/issues/10745): was `simp`.
map_add' x y := by simp; rw [ofFinsupp_add]
-- Porting note (https://github.com/leanprover-community/mathlib4/issues/10745): was `simp [← ofFinsupp_smul]`.
map_smul' r x := by simp; rw [← ofFinsupp_smul, smul_single']
@[simp]
theorem toFinsupp_monomial (n : ℕ) (r : R) : (monomial n r).toFinsupp = Finsupp.single n r := by
simp [monomial]
@[simp]
theorem ofFinsupp_single (n : ℕ) (r : R) : (⟨Finsupp.single n r⟩ : R[X]) = monomial n r := by
simp [monomial]
@[simp]
theorem monomial_zero_right (n : ℕ) : monomial n (0 : R) = 0 :=
(monomial n).map_zero
-- This is not a `simp` lemma as `monomial_zero_left` is more general.
theorem monomial_zero_one : monomial 0 (1 : R) = 1 :=
rfl
-- TODO: can't we just delete this one?
theorem monomial_add (n : ℕ) (r s : R) : monomial n (r + s) = monomial n r + monomial n s :=
(monomial n).map_add _ _
theorem monomial_mul_monomial (n m : ℕ) (r s : R) :
monomial n r * monomial m s = monomial (n + m) (r * s) :=
toFinsupp_injective <| by
simp only [toFinsupp_monomial, toFinsupp_mul, AddMonoidAlgebra.single_mul_single]
@[simp]
theorem monomial_pow (n : ℕ) (r : R) (k : ℕ) : monomial n r ^ k = monomial (n * k) (r ^ k) := by
induction k with
| zero => simp [pow_zero, monomial_zero_one]
| succ k ih => simp [pow_succ, ih, monomial_mul_monomial, mul_add, add_comm]
theorem smul_monomial {S} [SMulZeroClass S R] (a : S) (n : ℕ) (b : R) :
a • monomial n b = monomial n (a • b) :=
toFinsupp_injective <| AddMonoidAlgebra.smul_single _ _ _
theorem monomial_injective (n : ℕ) : Function.Injective (monomial n : R → R[X]) :=
(toFinsuppIso R).symm.injective.comp (single_injective n)
@[simp]
theorem monomial_eq_zero_iff (t : R) (n : ℕ) : monomial n t = 0 ↔ t = 0 :=
LinearMap.map_eq_zero_iff _ (Polynomial.monomial_injective n)
theorem monomial_eq_monomial_iff {m n : ℕ} {a b : R} :
monomial m a = monomial n b ↔ m = n ∧ a = b ∨ a = 0 ∧ b = 0 := by
rw [← toFinsupp_inj, toFinsupp_monomial, toFinsupp_monomial, Finsupp.single_eq_single_iff]
theorem support_add : (p + q).support ⊆ p.support ∪ q.support := by
simpa [support] using Finsupp.support_add
/-- `C a` is the constant polynomial `a`.
`C` is provided as a ring homomorphism.
-/
def C : R →+* R[X] :=
{ monomial 0 with
map_one' := by simp [monomial_zero_one]
map_mul' := by simp [monomial_mul_monomial]
map_zero' := by simp }
@[simp]
theorem monomial_zero_left (a : R) : monomial 0 a = C a :=
rfl
@[simp]
theorem toFinsupp_C (a : R) : (C a).toFinsupp = single 0 a :=
rfl
theorem C_0 : C (0 : R) = 0 := by simp
theorem C_1 : C (1 : R) = 1 :=
rfl
theorem C_mul : C (a * b) = C a * C b :=
C.map_mul a b
theorem C_add : C (a + b) = C a + C b :=
C.map_add a b
@[simp]
theorem smul_C {S} [SMulZeroClass S R] (s : S) (r : R) : s • C r = C (s • r) :=
smul_monomial _ _ r
theorem C_pow : C (a ^ n) = C a ^ n :=
C.map_pow a n
theorem C_eq_natCast (n : ℕ) : C (n : R) = (n : R[X]) :=
map_natCast C n
@[simp]
theorem C_mul_monomial : C a * monomial n b = monomial n (a * b) := by
simp only [← monomial_zero_left, monomial_mul_monomial, zero_add]
@[simp]
theorem monomial_mul_C : monomial n a * C b = monomial n (a * b) := by
simp only [← monomial_zero_left, monomial_mul_monomial, add_zero]
/-- `X` is the polynomial variable (aka indeterminate). -/
def X : R[X] :=
monomial 1 1
theorem monomial_one_one_eq_X : monomial 1 (1 : R) = X :=
rfl
theorem monomial_one_right_eq_X_pow (n : ℕ) : monomial n (1 : R) = X ^ n := by
induction n with
| zero => simp [monomial_zero_one]
| succ n ih => rw [pow_succ, ← ih, ← monomial_one_one_eq_X, monomial_mul_monomial, mul_one]
@[simp]
theorem toFinsupp_X : X.toFinsupp = Finsupp.single 1 (1 : R) :=
rfl
theorem X_ne_C [Nontrivial R] (a : R) : X ≠ C a := by
intro he
simpa using monomial_eq_monomial_iff.1 he
/-- `X` commutes with everything, even when the coefficients are noncommutative. -/
theorem X_mul : X * p = p * X := by
rcases p with ⟨⟩
simp only [X, ← ofFinsupp_single, ← ofFinsupp_mul, LinearMap.coe_mk, ofFinsupp.injEq]
ext
simp [AddMonoidAlgebra.mul_apply, AddMonoidAlgebra.sum_single_index, add_comm]
theorem X_pow_mul {n : ℕ} : X ^ n * p = p * X ^ n := by
induction n with
| zero => simp
| succ n ih =>
conv_lhs => rw [pow_succ]
rw [mul_assoc, X_mul, ← mul_assoc, ih, mul_assoc, ← pow_succ]
/-- Prefer putting constants to the left of `X`.
This lemma is the loop-avoiding `simp` version of `Polynomial.X_mul`. -/
@[simp]
theorem X_mul_C (r : R) : X * C r = C r * X :=
X_mul
/-- Prefer putting constants to the left of `X ^ n`.
This lemma is the loop-avoiding `simp` version of `X_pow_mul`. -/
@[simp]
theorem X_pow_mul_C (r : R) (n : ℕ) : X ^ n * C r = C r * X ^ n :=
X_pow_mul
theorem X_pow_mul_assoc {n : ℕ} : p * X ^ n * q = p * q * X ^ n := by
rw [mul_assoc, X_pow_mul, ← mul_assoc]
/-- Prefer putting constants to the left of `X ^ n`.
This lemma is the loop-avoiding `simp` version of `X_pow_mul_assoc`. -/
@[simp]
theorem X_pow_mul_assoc_C {n : ℕ} (r : R) : p * X ^ n * C r = p * C r * X ^ n :=
X_pow_mul_assoc
theorem commute_X (p : R[X]) : Commute X p :=
X_mul
theorem commute_X_pow (p : R[X]) (n : ℕ) : Commute (X ^ n) p :=
X_pow_mul
@[simp]
theorem monomial_mul_X (n : ℕ) (r : R) : monomial n r * X = monomial (n + 1) r := by
rw [X, monomial_mul_monomial, mul_one]
@[simp]
theorem monomial_mul_X_pow (n : ℕ) (r : R) (k : ℕ) :
monomial n r * X ^ k = monomial (n + k) r := by
induction k with
| zero => simp
| succ k ih => simp [ih, pow_succ, ← mul_assoc, add_assoc]
@[simp]
theorem X_mul_monomial (n : ℕ) (r : R) : X * monomial n r = monomial (n + 1) r := by
rw [X_mul, monomial_mul_X]
@[simp]
theorem X_pow_mul_monomial (k n : ℕ) (r : R) : X ^ k * monomial n r = monomial (n + k) r := by
rw [X_pow_mul, monomial_mul_X_pow]
/-- `coeff p n` (often denoted `p.coeff n`) is the coefficient of `X^n` in `p`. -/
def coeff : R[X] → ℕ → R
| ⟨p⟩ => p
@[simp]
theorem coeff_ofFinsupp (p) : coeff (⟨p⟩ : R[X]) = p := by rw [coeff]
theorem coeff_injective : Injective (coeff : R[X] → ℕ → R) := by
rintro ⟨p⟩ ⟨q⟩
simp only [coeff, DFunLike.coe_fn_eq, imp_self, ofFinsupp.injEq]
@[simp]
theorem coeff_inj : p.coeff = q.coeff ↔ p = q :=
coeff_injective.eq_iff
theorem toFinsupp_apply (f : R[X]) (i) : f.toFinsupp i = f.coeff i := by cases f; rfl
theorem coeff_monomial : coeff (monomial n a) m = if n = m then a else 0 := by
simp [coeff, Finsupp.single_apply]
@[simp]
theorem coeff_monomial_same (n : ℕ) (c : R) : (monomial n c).coeff n = c :=
Finsupp.single_eq_same
theorem coeff_monomial_of_ne {m n : ℕ} (c : R) (h : n ≠ m) : (monomial n c).coeff m = 0 :=
Finsupp.single_eq_of_ne h
@[simp]
theorem coeff_zero (n : ℕ) : coeff (0 : R[X]) n = 0 :=
rfl
theorem coeff_one {n : ℕ} : coeff (1 : R[X]) n = if n = 0 then 1 else 0 := by
simp_rw [eq_comm (a := n) (b := 0)]
exact coeff_monomial
@[simp]
theorem coeff_one_zero : coeff (1 : R[X]) 0 = 1 := by
simp [coeff_one]
@[simp]
theorem coeff_X_one : coeff (X : R[X]) 1 = 1 :=
coeff_monomial
@[simp]
theorem coeff_X_zero : coeff (X : R[X]) 0 = 0 :=
coeff_monomial
@[simp]
theorem coeff_monomial_succ : coeff (monomial (n + 1) a) 0 = 0 := by simp [coeff_monomial]
theorem coeff_X : coeff (X : R[X]) n = if 1 = n then 1 else 0 :=
coeff_monomial
theorem coeff_X_of_ne_one {n : ℕ} (hn : n ≠ 1) : coeff (X : R[X]) n = 0 := by
rw [coeff_X, if_neg hn.symm]
@[simp]
theorem mem_support_iff : n ∈ p.support ↔ p.coeff n ≠ 0 := by
rcases p with ⟨⟩
simp
theorem not_mem_support_iff : n ∉ p.support ↔ p.coeff n = 0 := by simp
theorem coeff_C : coeff (C a) n = ite (n = 0) a 0 := by
convert coeff_monomial (a := a) (m := n) (n := 0) using 2
simp [eq_comm]
@[simp]
theorem coeff_C_zero : coeff (C a) 0 = a :=
coeff_monomial
theorem coeff_C_ne_zero (h : n ≠ 0) : (C a).coeff n = 0 := by rw [coeff_C, if_neg h]
@[simp]
lemma coeff_C_succ {r : R} {n : ℕ} : coeff (C r) (n + 1) = 0 := by simp [coeff_C]
@[simp]
theorem coeff_natCast_ite : (Nat.cast m : R[X]).coeff n = ite (n = 0) m 0 := by
simp only [← C_eq_natCast, coeff_C, Nat.cast_ite, Nat.cast_zero]
@[simp]
theorem coeff_ofNat_zero (a : ℕ) [a.AtLeastTwo] :
coeff (ofNat(a) : R[X]) 0 = ofNat(a) :=
coeff_monomial
@[simp]
theorem coeff_ofNat_succ (a n : ℕ) [h : a.AtLeastTwo] :
coeff (ofNat(a) : R[X]) (n + 1) = 0 := by
rw [← Nat.cast_ofNat]
simp [-Nat.cast_ofNat]
theorem C_mul_X_pow_eq_monomial : ∀ {n : ℕ}, C a * X ^ n = monomial n a
| 0 => mul_one _
| n + 1 => by
rw [pow_succ, ← mul_assoc, C_mul_X_pow_eq_monomial, X, monomial_mul_monomial, mul_one]
@[simp high]
theorem toFinsupp_C_mul_X_pow (a : R) (n : ℕ) :
Polynomial.toFinsupp (C a * X ^ n) = Finsupp.single n a := by
rw [C_mul_X_pow_eq_monomial, toFinsupp_monomial]
theorem C_mul_X_eq_monomial : C a * X = monomial 1 a := by rw [← C_mul_X_pow_eq_monomial, pow_one]
@[simp high]
theorem toFinsupp_C_mul_X (a : R) : Polynomial.toFinsupp (C a * X) = Finsupp.single 1 a := by
rw [C_mul_X_eq_monomial, toFinsupp_monomial]
theorem C_injective : Injective (C : R → R[X]) :=
monomial_injective 0
@[simp]
theorem C_inj : C a = C b ↔ a = b :=
C_injective.eq_iff
@[simp]
theorem C_eq_zero : C a = 0 ↔ a = 0 :=
C_injective.eq_iff' (map_zero C)
theorem C_ne_zero : C a ≠ 0 ↔ a ≠ 0 :=
C_eq_zero.not
theorem subsingleton_iff_subsingleton : Subsingleton R[X] ↔ Subsingleton R :=
⟨@Injective.subsingleton _ _ _ C_injective, by
intro
infer_instance⟩
theorem Nontrivial.of_polynomial_ne (h : p ≠ q) : Nontrivial R :=
(subsingleton_or_nontrivial R).resolve_left fun _hI => h <| Subsingleton.elim _ _
theorem forall_eq_iff_forall_eq : (∀ f g : R[X], f = g) ↔ ∀ a b : R, a = b := by
simpa only [← subsingleton_iff] using subsingleton_iff_subsingleton
theorem ext_iff {p q : R[X]} : p = q ↔ ∀ n, coeff p n = coeff q n := by
rcases p with ⟨f : ℕ →₀ R⟩
rcases q with ⟨g : ℕ →₀ R⟩
simpa [coeff] using DFunLike.ext_iff (f := f) (g := g)
@[ext]
theorem ext {p q : R[X]} : (∀ n, coeff p n = coeff q n) → p = q :=
ext_iff.2
/-- Monomials generate the additive monoid of polynomials. -/
theorem addSubmonoid_closure_setOf_eq_monomial :
AddSubmonoid.closure { p : R[X] | ∃ n a, p = monomial n a } = ⊤ := by
apply top_unique
rw [← AddSubmonoid.map_equiv_top (toFinsuppIso R).symm.toAddEquiv, ←
Finsupp.add_closure_setOf_eq_single, AddMonoidHom.map_mclosure]
refine AddSubmonoid.closure_mono (Set.image_subset_iff.2 ?_)
rintro _ ⟨n, a, rfl⟩
exact ⟨n, a, Polynomial.ofFinsupp_single _ _⟩
theorem addHom_ext {M : Type*} [AddZeroClass M] {f g : R[X] →+ M}
(h : ∀ n a, f (monomial n a) = g (monomial n a)) : f = g :=
AddMonoidHom.eq_of_eqOn_denseM addSubmonoid_closure_setOf_eq_monomial <| by
rintro p ⟨n, a, rfl⟩
exact h n a
@[ext high]
theorem addHom_ext' {M : Type*} [AddZeroClass M] {f g : R[X] →+ M}
(h : ∀ n, f.comp (monomial n).toAddMonoidHom = g.comp (monomial n).toAddMonoidHom) : f = g :=
addHom_ext fun n => DFunLike.congr_fun (h n)
@[ext high]
theorem lhom_ext' {M : Type*} [AddCommMonoid M] [Module R M] {f g : R[X] →ₗ[R] M}
(h : ∀ n, f.comp (monomial n) = g.comp (monomial n)) : f = g :=
LinearMap.toAddMonoidHom_injective <| addHom_ext fun n => LinearMap.congr_fun (h n)
-- this has the same content as the subsingleton
theorem eq_zero_of_eq_zero (h : (0 : R) = (1 : R)) (p : R[X]) : p = 0 := by
rw [← one_smul R p, ← h, zero_smul]
section Fewnomials
theorem support_monomial (n) {a : R} (H : a ≠ 0) : (monomial n a).support = singleton n := by
rw [← ofFinsupp_single, support]; exact Finsupp.support_single_ne_zero _ H
theorem support_monomial' (n) (a : R) : (monomial n a).support ⊆ singleton n := by
rw [← ofFinsupp_single, support]
exact Finsupp.support_single_subset
theorem support_C {a : R} (h : a ≠ 0) : (C a).support = singleton 0 :=
support_monomial 0 h
theorem support_C_subset (a : R) : (C a).support ⊆ singleton 0 :=
support_monomial' 0 a
theorem support_C_mul_X {c : R} (h : c ≠ 0) : Polynomial.support (C c * X) = singleton 1 := by
rw [C_mul_X_eq_monomial, support_monomial 1 h]
theorem support_C_mul_X' (c : R) : Polynomial.support (C c * X) ⊆ singleton 1 := by
simpa only [C_mul_X_eq_monomial] using support_monomial' 1 c
theorem support_C_mul_X_pow (n : ℕ) {c : R} (h : c ≠ 0) :
Polynomial.support (C c * X ^ n) = singleton n := by
rw [C_mul_X_pow_eq_monomial, support_monomial n h]
theorem support_C_mul_X_pow' (n : ℕ) (c : R) : Polynomial.support (C c * X ^ n) ⊆ singleton n := by
simpa only [C_mul_X_pow_eq_monomial] using support_monomial' n c
open Finset
theorem support_binomial' (k m : ℕ) (x y : R) :
Polynomial.support (C x * X ^ k + C y * X ^ m) ⊆ {k, m} :=
support_add.trans
(union_subset
((support_C_mul_X_pow' k x).trans (singleton_subset_iff.mpr (mem_insert_self k {m})))
((support_C_mul_X_pow' m y).trans
(singleton_subset_iff.mpr (mem_insert_of_mem (mem_singleton_self m)))))
theorem support_trinomial' (k m n : ℕ) (x y z : R) :
Polynomial.support (C x * X ^ k + C y * X ^ m + C z * X ^ n) ⊆ {k, m, n} :=
support_add.trans
(union_subset
(support_add.trans
(union_subset
((support_C_mul_X_pow' k x).trans (singleton_subset_iff.mpr (mem_insert_self k {m, n})))
((support_C_mul_X_pow' m y).trans
(singleton_subset_iff.mpr (mem_insert_of_mem (mem_insert_self m {n}))))))
((support_C_mul_X_pow' n z).trans
(singleton_subset_iff.mpr (mem_insert_of_mem (mem_insert_of_mem (mem_singleton_self n))))))
end Fewnomials
theorem X_pow_eq_monomial (n) : X ^ n = monomial n (1 : R) := by
induction n with
| zero => rw [pow_zero, monomial_zero_one]
| succ n hn => rw [pow_succ, hn, X, monomial_mul_monomial, one_mul]
@[simp high]
theorem toFinsupp_X_pow (n : ℕ) : (X ^ n).toFinsupp = Finsupp.single n (1 : R) := by
rw [X_pow_eq_monomial, toFinsupp_monomial]
theorem smul_X_eq_monomial {n} : a • X ^ n = monomial n (a : R) := by
rw [X_pow_eq_monomial, smul_monomial, smul_eq_mul, mul_one]
theorem support_X_pow (H : ¬(1 : R) = 0) (n : ℕ) : (X ^ n : R[X]).support = singleton n := by
convert support_monomial n H
exact X_pow_eq_monomial n
theorem support_X_empty (H : (1 : R) = 0) : (X : R[X]).support = ∅ := by
rw [X, H, monomial_zero_right, support_zero]
theorem support_X (H : ¬(1 : R) = 0) : (X : R[X]).support = singleton 1 := by
rw [← pow_one X, support_X_pow H 1]
theorem monomial_left_inj {a : R} (ha : a ≠ 0) {i j : ℕ} :
monomial i a = monomial j a ↔ i = j := by
simp only [← ofFinsupp_single, ofFinsupp.injEq, Finsupp.single_left_inj ha]
theorem binomial_eq_binomial {k l m n : ℕ} {u v : R} (hu : u ≠ 0) (hv : v ≠ 0) :
C u * X ^ k + C v * X ^ l = C u * X ^ m + C v * X ^ n ↔
k = m ∧ l = n ∨ u = v ∧ k = n ∧ l = m ∨ u + v = 0 ∧ k = l ∧ m = n := by
simp_rw [C_mul_X_pow_eq_monomial, ← toFinsupp_inj, toFinsupp_add, toFinsupp_monomial]
exact Finsupp.single_add_single_eq_single_add_single hu hv
theorem natCast_mul (n : ℕ) (p : R[X]) : (n : R[X]) * p = n • p :=
(nsmul_eq_mul _ _).symm
/-- Summing the values of a function applied to the coefficients of a polynomial -/
def sum {S : Type*} [AddCommMonoid S] (p : R[X]) (f : ℕ → R → S) : S :=
∑ n ∈ p.support, f n (p.coeff n)
theorem sum_def {S : Type*} [AddCommMonoid S] (p : R[X]) (f : ℕ → R → S) :
p.sum f = ∑ n ∈ p.support, f n (p.coeff n) :=
rfl
theorem sum_eq_of_subset {S : Type*} [AddCommMonoid S] {p : R[X]} (f : ℕ → R → S)
(hf : ∀ i, f i 0 = 0) {s : Finset ℕ} (hs : p.support ⊆ s) :
p.sum f = ∑ n ∈ s, f n (p.coeff n) :=
Finsupp.sum_of_support_subset _ hs f (fun i _ ↦ hf i)
/-- Expressing the product of two polynomials as a double sum. -/
theorem mul_eq_sum_sum :
p * q = ∑ i ∈ p.support, q.sum fun j a => (monomial (i + j)) (p.coeff i * a) := by
apply toFinsupp_injective
rcases p with ⟨⟩; rcases q with ⟨⟩
simp_rw [sum, coeff, toFinsupp_sum, support, toFinsupp_mul, toFinsupp_monomial,
AddMonoidAlgebra.mul_def, Finsupp.sum]
@[simp]
theorem sum_zero_index {S : Type*} [AddCommMonoid S] (f : ℕ → R → S) : (0 : R[X]).sum f = 0 := by
simp [sum]
@[simp]
theorem sum_monomial_index {S : Type*} [AddCommMonoid S] {n : ℕ} (a : R) (f : ℕ → R → S)
(hf : f n 0 = 0) : (monomial n a : R[X]).sum f = f n a :=
Finsupp.sum_single_index hf
@[simp]
theorem sum_C_index {a} {β} [AddCommMonoid β] {f : ℕ → R → β} (h : f 0 0 = 0) :
(C a).sum f = f 0 a :=
sum_monomial_index a f h
-- the assumption `hf` is only necessary when the ring is trivial
@[simp]
theorem sum_X_index {S : Type*} [AddCommMonoid S] {f : ℕ → R → S} (hf : f 1 0 = 0) :
(X : R[X]).sum f = f 1 1 :=
sum_monomial_index 1 f hf
theorem sum_add_index {S : Type*} [AddCommMonoid S] (p q : R[X]) (f : ℕ → R → S)
(hf : ∀ i, f i 0 = 0) (h_add : ∀ a b₁ b₂, f a (b₁ + b₂) = f a b₁ + f a b₂) :
(p + q).sum f = p.sum f + q.sum f := by
rw [show p + q = ⟨p.toFinsupp + q.toFinsupp⟩ from add_def p q]
exact Finsupp.sum_add_index (fun i _ ↦ hf i) (fun a _ b₁ b₂ ↦ h_add a b₁ b₂)
theorem sum_add' {S : Type*} [AddCommMonoid S] (p : R[X]) (f g : ℕ → R → S) :
p.sum (f + g) = p.sum f + p.sum g := by simp [sum_def, Finset.sum_add_distrib]
theorem sum_add {S : Type*} [AddCommMonoid S] (p : R[X]) (f g : ℕ → R → S) :
(p.sum fun n x => f n x + g n x) = p.sum f + p.sum g :=
sum_add' _ _ _
|
theorem sum_smul_index {S : Type*} [AddCommMonoid S] (p : R[X]) (b : R) (f : ℕ → R → S)
(hf : ∀ i, f i 0 = 0) : (b • p).sum f = p.sum fun n a => f n (b * a) :=
| Mathlib/Algebra/Polynomial/Basic.lean | 888 | 890 |
/-
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 _ _
| Mathlib/Combinatorics/Enumerative/Composition.lean | 327 | 340 |
/-
Copyright (c) 2018 Kenny Lau. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Kenny Lau, Chris Hughes, Anne Baanen
-/
import Mathlib.Data.Matrix.Basic
import Mathlib.Data.Matrix.Block
import Mathlib.Data.Matrix.Notation
import Mathlib.Data.Matrix.RowCol
import Mathlib.GroupTheory.GroupAction.Ring
import Mathlib.GroupTheory.Perm.Fin
import Mathlib.LinearAlgebra.Alternating.Basic
import Mathlib.LinearAlgebra.Matrix.SemiringInverse
/-!
# Determinant of a matrix
This file defines the determinant of a matrix, `Matrix.det`, and its essential properties.
## Main definitions
- `Matrix.det`: the determinant of a square matrix, as a sum over permutations
- `Matrix.detRowAlternating`: the determinant, as an `AlternatingMap` in the rows of the matrix
## Main results
- `det_mul`: the determinant of `A * B` is the product of determinants
- `det_zero_of_row_eq`: the determinant is zero if there is a repeated row
- `det_block_diagonal`: the determinant of a block diagonal matrix is a product
of the blocks' determinants
## Implementation notes
It is possible to configure `simp` to compute determinants. See the file
`MathlibTest/matrix.lean` for some examples.
-/
universe u v w z
open Equiv Equiv.Perm Finset Function
namespace Matrix
variable {m n : Type*} [DecidableEq n] [Fintype n] [DecidableEq m] [Fintype m]
variable {R : Type v} [CommRing R]
local notation "ε " σ:arg => ((sign σ : ℤ) : R)
/-- `det` is an `AlternatingMap` in the rows of the matrix. -/
def detRowAlternating : (n → R) [⋀^n]→ₗ[R] R :=
MultilinearMap.alternatization ((MultilinearMap.mkPiAlgebra R n R).compLinearMap LinearMap.proj)
/-- The determinant of a matrix given by the Leibniz formula. -/
abbrev det (M : Matrix n n R) : R :=
detRowAlternating M
theorem det_apply (M : Matrix n n R) : M.det = ∑ σ : Perm n, Equiv.Perm.sign σ • ∏ i, M (σ i) i :=
MultilinearMap.alternatization_apply _ M
-- This is what the old definition was. We use it to avoid having to change the old proofs below
theorem det_apply' (M : Matrix n n R) : M.det = ∑ σ : Perm n, ε σ * ∏ i, M (σ i) i := by
simp [det_apply, Units.smul_def]
theorem det_eq_detp_sub_detp (M : Matrix n n R) : M.det = M.detp 1 - M.detp (-1) := by
rw [det_apply, ← Equiv.sum_comp (Equiv.inv (Perm n)), ← ofSign_disjUnion, sum_disjUnion]
simp_rw [inv_apply, sign_inv, sub_eq_add_neg, detp, ← sum_neg_distrib]
refine congr_arg₂ (· + ·) (sum_congr rfl fun σ hσ ↦ ?_) (sum_congr rfl fun σ hσ ↦ ?_) <;>
rw [mem_ofSign.mp hσ, ← Equiv.prod_comp σ] <;> simp
@[simp]
theorem det_diagonal {d : n → R} : det (diagonal d) = ∏ i, d i := by
rw [det_apply']
refine (Finset.sum_eq_single 1 ?_ ?_).trans ?_
· rintro σ - h2
obtain ⟨x, h3⟩ := not_forall.1 (mt Equiv.ext h2)
convert mul_zero (ε σ)
apply Finset.prod_eq_zero (mem_univ x)
exact if_neg h3
· simp
· simp
theorem det_zero (_ : Nonempty n) : det (0 : Matrix n n R) = 0 :=
(detRowAlternating : (n → R) [⋀^n]→ₗ[R] R).map_zero
@[simp]
theorem det_one : det (1 : Matrix n n R) = 1 := by rw [← diagonal_one]; simp [-diagonal_one]
theorem det_isEmpty [IsEmpty n] {A : Matrix n n R} : det A = 1 := by simp [det_apply]
@[simp]
theorem coe_det_isEmpty [IsEmpty n] : (det : Matrix n n R → R) = Function.const _ 1 := by
ext
exact det_isEmpty
theorem det_eq_one_of_card_eq_zero {A : Matrix n n R} (h : Fintype.card n = 0) : det A = 1 :=
haveI : IsEmpty n := Fintype.card_eq_zero_iff.mp h
det_isEmpty
/-- If `n` has only one element, the determinant of an `n` by `n` matrix is just that element.
Although `Unique` implies `DecidableEq` and `Fintype`, the instances might
not be syntactically equal. Thus, we need to fill in the args explicitly. -/
@[simp]
theorem det_unique {n : Type*} [Unique n] [DecidableEq n] [Fintype n] (A : Matrix n n R) :
det A = A default default := by simp [det_apply, univ_unique]
theorem det_eq_elem_of_subsingleton [Subsingleton n] (A : Matrix n n R) (k : n) :
det A = A k k := by
have := uniqueOfSubsingleton k
convert det_unique A
theorem det_eq_elem_of_card_eq_one {A : Matrix n n R} (h : Fintype.card n = 1) (k : n) :
det A = A k k :=
haveI : Subsingleton n := Fintype.card_le_one_iff_subsingleton.mp h.le
det_eq_elem_of_subsingleton _ _
theorem det_mul_aux {M N : Matrix n n R} {p : n → n} (H : ¬Bijective p) :
(∑ σ : Perm n, ε σ * ∏ x, M (σ x) (p x) * N (p x) x) = 0 := by
obtain ⟨i, j, hpij, hij⟩ : ∃ i j, p i = p j ∧ i ≠ j := by
rw [← Finite.injective_iff_bijective, Injective] at H
push_neg at H
exact H
exact
sum_involution (fun σ _ => σ * Equiv.swap i j)
(fun σ _ => by
have : (∏ x, M (σ x) (p x)) = ∏ x, M ((σ * Equiv.swap i j) x) (p x) :=
Fintype.prod_equiv (swap i j) _ _ (by simp [apply_swap_eq_self hpij])
simp [this, sign_swap hij, -sign_swap', prod_mul_distrib])
(fun σ _ _ => (not_congr mul_swap_eq_iff).mpr hij) (fun _ _ => mem_univ _) fun σ _ =>
mul_swap_involutive i j σ
@[simp]
theorem det_mul (M N : Matrix n n R) : det (M * N) = det M * det N :=
calc
det (M * N) = ∑ p : n → n, ∑ σ : Perm n, ε σ * ∏ i, M (σ i) (p i) * N (p i) i := by
simp only [det_apply', mul_apply, prod_univ_sum, mul_sum, Fintype.piFinset_univ]
rw [Finset.sum_comm]
_ = ∑ p : n → n with Bijective p, ∑ σ : Perm n, ε σ * ∏ i, M (σ i) (p i) * N (p i) i := by
refine (sum_subset (filter_subset _ _) fun f _ hbij ↦ det_mul_aux ?_).symm
simpa only [true_and, mem_filter, mem_univ] using hbij
_ = ∑ τ : Perm n, ∑ σ : Perm n, ε σ * ∏ i, M (σ i) (τ i) * N (τ i) i :=
sum_bij (fun p h ↦ Equiv.ofBijective p (mem_filter.1 h).2) (fun _ _ ↦ mem_univ _)
(fun _ _ _ _ h ↦ by injection h)
(fun b _ ↦ ⟨b, mem_filter.2 ⟨mem_univ _, b.bijective⟩, coe_fn_injective rfl⟩) fun _ _ ↦ rfl
_ = ∑ σ : Perm n, ∑ τ : Perm n, (∏ i, N (σ i) i) * ε τ * ∏ j, M (τ j) (σ j) := by
simp only [mul_comm, mul_left_comm, prod_mul_distrib, mul_assoc]
_ = ∑ σ : Perm n, ∑ τ : Perm n, (∏ i, N (σ i) i) * (ε σ * ε τ) * ∏ i, M (τ i) i :=
(sum_congr rfl fun σ _ =>
Fintype.sum_equiv (Equiv.mulRight σ⁻¹) _ _ fun τ => by
have : (∏ j, M (τ j) (σ j)) = ∏ j, M ((τ * σ⁻¹) j) j := by
rw [← (σ⁻¹ : _ ≃ _).prod_comp]
simp only [Equiv.Perm.coe_mul, apply_inv_self, Function.comp_apply]
have h : ε σ * ε (τ * σ⁻¹) = ε τ :=
calc
ε σ * ε (τ * σ⁻¹) = ε (τ * σ⁻¹ * σ) := by
rw [mul_comm, sign_mul (τ * σ⁻¹)]
simp only [Int.cast_mul, Units.val_mul]
_ = ε τ := by simp only [inv_mul_cancel_right]
simp_rw [Equiv.coe_mulRight, h]
simp only [this])
_ = det M * det N := by
simp only [det_apply', Finset.mul_sum, mul_comm, mul_left_comm, mul_assoc]
/-- The determinant of a matrix, as a monoid homomorphism. -/
def detMonoidHom : Matrix n n R →* R where
toFun := det
map_one' := det_one
map_mul' := det_mul
@[simp]
theorem coe_detMonoidHom : (detMonoidHom : Matrix n n R → R) = det :=
rfl
/-- On square matrices, `mul_comm` applies under `det`. -/
theorem det_mul_comm (M N : Matrix m m R) : det (M * N) = det (N * M) := by
rw [det_mul, det_mul, mul_comm]
/-- On square matrices, `mul_left_comm` applies under `det`. -/
theorem det_mul_left_comm (M N P : Matrix m m R) : det (M * (N * P)) = det (N * (M * P)) := by
rw [← Matrix.mul_assoc, ← Matrix.mul_assoc, det_mul, det_mul_comm M N, ← det_mul]
/-- On square matrices, `mul_right_comm` applies under `det`. -/
theorem det_mul_right_comm (M N P : Matrix m m R) : det (M * N * P) = det (M * P * N) := by
rw [Matrix.mul_assoc, Matrix.mul_assoc, det_mul, det_mul_comm N P, ← det_mul]
-- TODO(https://github.com/leanprover-community/mathlib4/issues/6607): fix elaboration so `val` isn't needed
theorem det_units_conj (M : (Matrix m m R)ˣ) (N : Matrix m m R) :
det (M.val * N * M⁻¹.val) = det N := by
rw [det_mul_right_comm, Units.mul_inv, one_mul]
-- TODO(https://github.com/leanprover-community/mathlib4/issues/6607): fix elaboration so `val` isn't needed
theorem det_units_conj' (M : (Matrix m m R)ˣ) (N : Matrix m m R) :
det (M⁻¹.val * N * ↑M.val) = det N :=
det_units_conj M⁻¹ N
/-- Transposing a matrix preserves the determinant. -/
@[simp]
theorem det_transpose (M : Matrix n n R) : Mᵀ.det = M.det := by
rw [det_apply', det_apply']
refine Fintype.sum_bijective _ inv_involutive.bijective _ _ ?_
intro σ
rw [sign_inv]
congr 1
apply Fintype.prod_equiv σ
simp
/-- Permuting the columns changes the sign of the determinant. -/
theorem det_permute (σ : Perm n) (M : Matrix n n R) :
(M.submatrix σ id).det = Perm.sign σ * M.det :=
((detRowAlternating : (n → R) [⋀^n]→ₗ[R] R).map_perm M σ).trans (by simp [Units.smul_def])
/-- Permuting the rows changes the sign of the determinant. -/
theorem det_permute' (σ : Perm n) (M : Matrix n n R) :
(M.submatrix id σ).det = Perm.sign σ * M.det := by
rw [← det_transpose, transpose_submatrix, det_permute, det_transpose]
/-- Permuting rows and columns with the same equivalence does not change the determinant. -/
@[simp]
theorem det_submatrix_equiv_self (e : n ≃ m) (A : Matrix m m R) :
det (A.submatrix e e) = det A := by
rw [det_apply', det_apply']
apply Fintype.sum_equiv (Equiv.permCongr e)
intro σ
rw [Equiv.Perm.sign_permCongr e σ]
congr 1
apply Fintype.prod_equiv e
intro i
rw [Equiv.permCongr_apply, Equiv.symm_apply_apply, submatrix_apply]
/-- Permuting rows and columns with two equivalences does not change the absolute value of the
determinant. -/
@[simp]
theorem abs_det_submatrix_equiv_equiv {R : Type*}
[CommRing R] [LinearOrder R] [IsStrictOrderedRing R]
(e₁ e₂ : n ≃ m) (A : Matrix m m R) :
|(A.submatrix e₁ e₂).det| = |A.det| := by
have hee : e₂ = e₁.trans (e₁.symm.trans e₂) := by ext; simp
rw [hee]
show |((A.submatrix id (e₁.symm.trans e₂)).submatrix e₁ e₁).det| = |A.det|
rw [Matrix.det_submatrix_equiv_self, Matrix.det_permute', abs_mul, abs_unit_intCast, one_mul]
/-- Reindexing both indices along the same equivalence preserves the determinant.
| For the `simp` version of this lemma, see `det_submatrix_equiv_self`; this one is unsuitable because
`Matrix.reindex_apply` unfolds `reindex` first.
-/
theorem det_reindex_self (e : m ≃ n) (A : Matrix m m R) : det (reindex e e A) = det A :=
det_submatrix_equiv_self e.symm A
/-- Reindexing both indices along equivalences preserves the absolute of the determinant.
For the `simp` version of this lemma, see `abs_det_submatrix_equiv_equiv`;
this one is unsuitable because `Matrix.reindex_apply` unfolds `reindex` first.
| Mathlib/LinearAlgebra/Matrix/Determinant/Basic.lean | 246 | 255 |
/-
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.Order.Star.Basic
import Mathlib.Data.Matrix.RowCol
/-!
# Dot product of two vectors
This file contains some results on the map `dotProduct`, which maps two
vectors `v w : n → R` to the sum of the entrywise products `v i * w i`.
## Main results
* `dotProduct_stdBasis_one`: the dot product of `v` with the `i`th
standard basis vector is `v i`
* `dotProduct_eq_zero_iff`: if `v`'s dot product with all `w` is zero,
then `v` is zero
## Tags
matrix
-/
variable {m n p R : Type*}
section Semiring
variable [Semiring R] [Fintype n]
theorem dotProduct_eq (v w : n → R) (h : ∀ u, dotProduct v u = dotProduct w u) : v = w := by
funext x
classical rw [← dotProduct_single_one v x, ← dotProduct_single_one w x, h]
@[deprecated (since := "2024-12-12")] protected alias Matrix.dotProduct_eq := dotProduct_eq
theorem dotProduct_eq_iff {v w : n → R} : (∀ u, dotProduct v u = dotProduct w u) ↔ v = w :=
⟨fun h => dotProduct_eq v w h, fun h _ => h ▸ rfl⟩
@[deprecated (since := "2024-12-12")] protected alias Matrix.dotProduct_eq_iff := dotProduct_eq_iff
theorem dotProduct_eq_zero (v : n → R) (h : ∀ w, dotProduct v w = 0) : v = 0 :=
dotProduct_eq _ _ fun u => (h u).symm ▸ (zero_dotProduct u).symm
@[deprecated (since := "2024-12-12")]
protected alias Matrix.dotProduct_eq_zero := dotProduct_eq_zero
theorem dotProduct_eq_zero_iff {v : n → R} : (∀ w, dotProduct v w = 0) ↔ v = 0 :=
⟨fun h => dotProduct_eq_zero v h, fun h w => h.symm ▸ zero_dotProduct w⟩
@[deprecated (since := "2024-12-12")]
protected alias Matrix.dotProduct_eq_zero_iff := dotProduct_eq_zero_iff
end Semiring
section OrderedSemiring
variable [Semiring R] [PartialOrder R] [IsOrderedRing R] [Fintype n]
lemma dotProduct_nonneg_of_nonneg {v w : n → R} (hv : 0 ≤ v) (hw : 0 ≤ w) : 0 ≤ dotProduct v w :=
Finset.sum_nonneg (fun i _ => mul_nonneg (hv i) (hw i))
@[deprecated (since := "2024-12-12")]
protected alias Matrix.dotProduct_nonneg_of_nonneg := dotProduct_nonneg_of_nonneg
lemma dotProduct_le_dotProduct_of_nonneg_right {u v w : n → R} (huv : u ≤ v) (hw : 0 ≤ w) :
dotProduct u w ≤ dotProduct v w :=
Finset.sum_le_sum (fun i _ => mul_le_mul_of_nonneg_right (huv i) (hw i))
@[deprecated (since := "2024-12-12")]
protected alias Matrix.dotProduct_le_dotProduct_of_nonneg_right :=
dotProduct_le_dotProduct_of_nonneg_right
lemma dotProduct_le_dotProduct_of_nonneg_left {u v w : n → R} (huv : u ≤ v) (hw : 0 ≤ w) :
dotProduct w u ≤ dotProduct w v :=
Finset.sum_le_sum (fun i _ => mul_le_mul_of_nonneg_left (huv i) (hw i))
@[deprecated (since := "2024-12-12")]
protected alias Matrix.dotProduct_le_dotProduct_of_nonneg_left :=
dotProduct_le_dotProduct_of_nonneg_left
end OrderedSemiring
section Self
variable [Fintype m] [Fintype n] [Fintype p]
@[simp]
theorem dotProduct_self_eq_zero [Ring R] [LinearOrder R] [IsStrictOrderedRing R] {v : n → R} :
dotProduct v v = 0 ↔ v = 0 :=
(Finset.sum_eq_zero_iff_of_nonneg fun i _ => mul_self_nonneg (v i)).trans <| by
simp [funext_iff]
@[deprecated (since := "2024-12-12")]
protected alias Matrix.dotProduct_self_eq_zero := dotProduct_self_eq_zero
section StarOrderedRing
variable [PartialOrder R] [NonUnitalRing R] [StarRing R] [StarOrderedRing R]
/-- Note that this applies to `ℂ` via `RCLike.toStarOrderedRing`. -/
| @[simp]
theorem dotProduct_star_self_nonneg (v : n → R) : 0 ≤ dotProduct (star v) v :=
Fintype.sum_nonneg fun _ => star_mul_self_nonneg _
| Mathlib/LinearAlgebra/Matrix/DotProduct.lean | 106 | 108 |
/-
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]
| Mathlib/Analysis/MeanInequalitiesPow.lean | 150 | 160 |
/-
Copyright (c) 2016 Jeremy Avigad. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Jeremy Avigad, Leonardo de Moura, Mario Carneiro, Johannes Hölzl
-/
import Mathlib.Algebra.Order.Group.Unbundled.Basic
import Mathlib.Algebra.Order.Monoid.Defs
import Mathlib.Algebra.Order.Sub.Defs
import Mathlib.Util.AssertExists
/-!
# Ordered groups
This file defines bundled ordered groups and develops a few basic results.
## Implementation details
Unfortunately, the number of `'` appended to lemmas in this file
may differ between the multiplicative and the additive version of a lemma.
The reason is that we did not want to change existing names in the library.
-/
/-
`NeZero` theory should not be needed at this point in the ordered algebraic hierarchy.
-/
assert_not_imported Mathlib.Algebra.NeZero
open Function
universe u
variable {α : Type u}
/-- An ordered additive commutative group is an additive commutative group
with a partial order in which addition is strictly monotone. -/
@[deprecated "Use `[AddCommGroup α] [PartialOrder α] [IsOrderedAddMonoid α]` instead."
(since := "2025-04-10")]
structure OrderedAddCommGroup (α : Type u) extends AddCommGroup α, PartialOrder α where
/-- Addition is monotone in an ordered additive commutative group. -/
protected add_le_add_left : ∀ a b : α, a ≤ b → ∀ c : α, c + a ≤ c + b
set_option linter.existingAttributeWarning false in
/-- An ordered commutative group is a commutative group
with a partial order in which multiplication is strictly monotone. -/
@[to_additive,
deprecated "Use `[CommGroup α] [PartialOrder α] [IsOrderedMonoid α]` instead."
(since := "2025-04-10")]
structure OrderedCommGroup (α : Type u) extends CommGroup α, PartialOrder α where
/-- Multiplication is monotone in an ordered commutative group. -/
protected mul_le_mul_left : ∀ a b : α, a ≤ b → ∀ c : α, c * a ≤ c * b
alias OrderedCommGroup.mul_lt_mul_left' := mul_lt_mul_left'
attribute [to_additive OrderedAddCommGroup.add_lt_add_left] OrderedCommGroup.mul_lt_mul_left'
alias OrderedCommGroup.le_of_mul_le_mul_left := le_of_mul_le_mul_left'
attribute [to_additive] OrderedCommGroup.le_of_mul_le_mul_left
alias OrderedCommGroup.lt_of_mul_lt_mul_left := lt_of_mul_lt_mul_left'
attribute [to_additive] OrderedCommGroup.lt_of_mul_lt_mul_left
-- See note [lower instance priority]
@[to_additive IsOrderedAddMonoid.toIsOrderedCancelAddMonoid]
instance (priority := 100) IsOrderedMonoid.toIsOrderedCancelMonoid
[CommGroup α] [PartialOrder α] [IsOrderedMonoid α] : IsOrderedCancelMonoid α where
le_of_mul_le_mul_left a b c bc := by simpa using mul_le_mul_left' bc a⁻¹
le_of_mul_le_mul_right a b c bc := by simpa using mul_le_mul_left' bc a⁻¹
/-!
### Linearly ordered commutative groups
-/
set_option linter.deprecated false in
/-- A linearly ordered additive commutative group is an
additive commutative group with a linear order in which
addition is monotone. -/
@[deprecated "Use `[AddCommGroup α] [LinearOrder α] [IsOrderedAddMonoid α]` instead."
(since := "2025-04-10")]
structure LinearOrderedAddCommGroup (α : Type u) extends OrderedAddCommGroup α, LinearOrder α
set_option linter.existingAttributeWarning false in
set_option linter.deprecated false in
/-- A linearly ordered commutative group is a
commutative group with a linear order in which
multiplication is monotone. -/
@[to_additive,
deprecated "Use `[CommGroup α] [LinearOrder α] [IsOrderedMonoid α]` instead."
(since := "2025-04-10")]
structure LinearOrderedCommGroup (α : Type u) extends OrderedCommGroup α, LinearOrder α
attribute [nolint docBlame]
LinearOrderedCommGroup.toLinearOrder LinearOrderedAddCommGroup.toLinearOrder
section LinearOrderedCommGroup
variable [CommGroup α] [LinearOrder α] [IsOrderedMonoid α] {a : α}
@[to_additive LinearOrderedAddCommGroup.add_lt_add_left]
theorem LinearOrderedCommGroup.mul_lt_mul_left' (a b : α) (h : a < b) (c : α) : c * a < c * b :=
_root_.mul_lt_mul_left' h c
@[to_additive eq_zero_of_neg_eq]
theorem eq_one_of_inv_eq' (h : a⁻¹ = a) : a = 1 :=
match lt_trichotomy a 1 with
| Or.inl h₁ =>
have : 1 < a := h ▸ one_lt_inv_of_inv h₁
absurd h₁ this.asymm
| Or.inr (Or.inl h₁) => h₁
| Or.inr (Or.inr h₁) =>
have : a < 1 := h ▸ inv_lt_one'.mpr h₁
absurd h₁ this.asymm
@[to_additive exists_zero_lt]
theorem exists_one_lt' [Nontrivial α] : ∃ a : α, 1 < a := by
obtain ⟨y, hy⟩ := Decidable.exists_ne (1 : α)
obtain h|h := hy.lt_or_lt
· exact ⟨y⁻¹, one_lt_inv'.mpr h⟩
· exact ⟨y, h⟩
-- see Note [lower instance priority]
@[to_additive]
instance (priority := 100) LinearOrderedCommGroup.to_noMaxOrder [Nontrivial α] : NoMaxOrder α :=
⟨by
obtain ⟨y, hy⟩ : ∃ a : α, 1 < a := exists_one_lt'
exact fun a => ⟨a * y, lt_mul_of_one_lt_right' a hy⟩⟩
-- see Note [lower instance priority]
@[to_additive]
instance (priority := 100) LinearOrderedCommGroup.to_noMinOrder [Nontrivial α] : NoMinOrder α :=
⟨by
obtain ⟨y, hy⟩ : ∃ a : α, 1 < a := exists_one_lt'
exact fun a => ⟨a / y, (div_lt_self_iff a).mpr hy⟩⟩
@[to_additive (attr := simp)]
theorem inv_le_self_iff : a⁻¹ ≤ a ↔ 1 ≤ a := by simp [inv_le_iff_one_le_mul']
@[to_additive (attr := simp)]
theorem inv_lt_self_iff : a⁻¹ < a ↔ 1 < a := by simp [inv_lt_iff_one_lt_mul]
@[to_additive (attr := simp)]
theorem le_inv_self_iff : a ≤ a⁻¹ ↔ a ≤ 1 := by simp [← not_iff_not]
@[to_additive (attr := simp)]
theorem lt_inv_self_iff : a < a⁻¹ ↔ a < 1 := by simp [← not_iff_not]
end LinearOrderedCommGroup
section NormNumLemmas
/- The following lemmas are stated so that the `norm_num` tactic can use them with the
expected signatures. -/
variable [CommGroup α] [PartialOrder α] [IsOrderedMonoid α] {a b : α}
@[to_additive (attr := gcongr) neg_le_neg]
theorem inv_le_inv' : a ≤ b → b⁻¹ ≤ a⁻¹ :=
inv_le_inv_iff.mpr
@[to_additive (attr := gcongr) neg_lt_neg]
theorem inv_lt_inv' : a < b → b⁻¹ < a⁻¹ :=
inv_lt_inv_iff.mpr
-- The additive version is also a `linarith` lemma.
@[to_additive]
theorem inv_lt_one_of_one_lt : 1 < a → a⁻¹ < 1 :=
inv_lt_one_iff_one_lt.mpr
-- The additive version is also a `linarith` lemma.
@[to_additive]
theorem inv_le_one_of_one_le : 1 ≤ a → a⁻¹ ≤ 1 :=
inv_le_one'.mpr
@[to_additive neg_nonneg_of_nonpos]
theorem one_le_inv_of_le_one : a ≤ 1 → 1 ≤ a⁻¹ :=
one_le_inv'.mpr
end NormNumLemmas
| Mathlib/Algebra/Order/Group/Defs.lean | 937 | 939 | |
/-
Copyright (c) 2019 Chris Hughes. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Chris Hughes, Yakov Pechersky
-/
import Mathlib.Data.List.Nodup
import Mathlib.Data.List.Infix
import Mathlib.Data.Quot
/-!
# List rotation
This file proves basic results about `List.rotate`, the list rotation.
## Main declarations
* `List.IsRotated l₁ l₂`: States that `l₁` is a rotated version of `l₂`.
* `List.cyclicPermutations l`: The list of all cyclic permutants of `l`, up to the length of `l`.
## Tags
rotated, rotation, permutation, cycle
-/
universe u
variable {α : Type u}
open Nat Function
namespace List
theorem rotate_mod (l : List α) (n : ℕ) : l.rotate (n % l.length) = l.rotate n := by simp [rotate]
@[simp]
theorem rotate_nil (n : ℕ) : ([] : List α).rotate n = [] := by simp [rotate]
@[simp]
theorem rotate_zero (l : List α) : l.rotate 0 = l := by simp [rotate]
theorem rotate'_nil (n : ℕ) : ([] : List α).rotate' n = [] := by simp
@[simp]
theorem rotate'_zero (l : List α) : l.rotate' 0 = l := by cases l <;> rfl
theorem rotate'_cons_succ (l : List α) (a : α) (n : ℕ) :
(a :: l : List α).rotate' n.succ = (l ++ [a]).rotate' n := by simp [rotate']
@[simp]
theorem length_rotate' : ∀ (l : List α) (n : ℕ), (l.rotate' n).length = l.length
| [], _ => by simp
| _ :: _, 0 => rfl
| a :: l, n + 1 => by rw [List.rotate', length_rotate' (l ++ [a]) n]; simp
theorem rotate'_eq_drop_append_take :
∀ {l : List α} {n : ℕ}, n ≤ l.length → l.rotate' n = l.drop n ++ l.take n
| [], n, h => by simp [drop_append_of_le_length h]
| l, 0, h => by simp [take_append_of_le_length h]
| a :: l, n + 1, h => by
have hnl : n ≤ l.length := le_of_succ_le_succ h
have hnl' : n ≤ (l ++ [a]).length := by
rw [length_append, length_cons, List.length]; exact le_of_succ_le h
rw [rotate'_cons_succ, rotate'_eq_drop_append_take hnl', drop, take,
drop_append_of_le_length hnl, take_append_of_le_length hnl]; simp
theorem rotate'_rotate' : ∀ (l : List α) (n m : ℕ), (l.rotate' n).rotate' m = l.rotate' (n + m)
| a :: l, 0, m => by simp
| [], n, m => by simp
| a :: l, n + 1, m => by
rw [rotate'_cons_succ, rotate'_rotate' _ n, Nat.add_right_comm, ← rotate'_cons_succ,
Nat.succ_eq_add_one]
@[simp]
theorem rotate'_length (l : List α) : rotate' l l.length = l := by
rw [rotate'_eq_drop_append_take le_rfl]; simp
@[simp]
theorem rotate'_length_mul (l : List α) : ∀ n : ℕ, l.rotate' (l.length * n) = l
| 0 => by simp
| n + 1 =>
calc
l.rotate' (l.length * (n + 1)) =
(l.rotate' (l.length * n)).rotate' (l.rotate' (l.length * n)).length := by
simp [-rotate'_length, Nat.mul_succ, rotate'_rotate']
_ = l := by rw [rotate'_length, rotate'_length_mul l n]
theorem rotate'_mod (l : List α) (n : ℕ) : l.rotate' (n % l.length) = l.rotate' n :=
calc
l.rotate' (n % l.length) =
(l.rotate' (n % l.length)).rotate' ((l.rotate' (n % l.length)).length * (n / l.length)) :=
by rw [rotate'_length_mul]
_ = l.rotate' n := by rw [rotate'_rotate', length_rotate', Nat.mod_add_div]
theorem rotate_eq_rotate' (l : List α) (n : ℕ) : l.rotate n = l.rotate' n :=
if h : l.length = 0 then by simp_all [length_eq_zero_iff]
else by
rw [← rotate'_mod,
rotate'_eq_drop_append_take (le_of_lt (Nat.mod_lt _ (Nat.pos_of_ne_zero h)))]
simp [rotate]
@[simp] theorem rotate_cons_succ (l : List α) (a : α) (n : ℕ) :
(a :: l : List α).rotate (n + 1) = (l ++ [a]).rotate n := by
rw [rotate_eq_rotate', rotate_eq_rotate', rotate'_cons_succ]
@[simp]
theorem mem_rotate : ∀ {l : List α} {a : α} {n : ℕ}, a ∈ l.rotate n ↔ a ∈ l
| [], _, n => by simp
| a :: l, _, 0 => by simp
| a :: l, _, n + 1 => by simp [rotate_cons_succ, mem_rotate, or_comm]
@[simp]
theorem length_rotate (l : List α) (n : ℕ) : (l.rotate n).length = l.length := by
rw [rotate_eq_rotate', length_rotate']
@[simp]
theorem rotate_replicate (a : α) (n : ℕ) (k : ℕ) : (replicate n a).rotate k = replicate n a :=
eq_replicate_iff.2 ⟨by rw [length_rotate, length_replicate], fun b hb =>
eq_of_mem_replicate <| mem_rotate.1 hb⟩
theorem rotate_eq_drop_append_take {l : List α} {n : ℕ} :
n ≤ l.length → l.rotate n = l.drop n ++ l.take n := by
rw [rotate_eq_rotate']; exact rotate'_eq_drop_append_take
theorem rotate_eq_drop_append_take_mod {l : List α} {n : ℕ} :
l.rotate n = l.drop (n % l.length) ++ l.take (n % l.length) := by
rcases l.length.zero_le.eq_or_lt with hl | hl
· simp [eq_nil_of_length_eq_zero hl.symm]
rw [← rotate_eq_drop_append_take (n.mod_lt hl).le, rotate_mod]
@[simp]
theorem rotate_append_length_eq (l l' : List α) : (l ++ l').rotate l.length = l' ++ l := by
rw [rotate_eq_rotate']
induction l generalizing l'
· simp
· simp_all [rotate']
theorem rotate_rotate (l : List α) (n m : ℕ) : (l.rotate n).rotate m = l.rotate (n + m) := by
rw [rotate_eq_rotate', rotate_eq_rotate', rotate_eq_rotate', rotate'_rotate']
@[simp]
theorem rotate_length (l : List α) : rotate l l.length = l := by
rw [rotate_eq_rotate', rotate'_length]
@[simp]
theorem rotate_length_mul (l : List α) (n : ℕ) : l.rotate (l.length * n) = l := by
| rw [rotate_eq_rotate', rotate'_length_mul]
theorem rotate_perm (l : List α) (n : ℕ) : l.rotate n ~ l := by
rw [rotate_eq_rotate']
induction' n with n hn generalizing l
| Mathlib/Data/List/Rotate.lean | 147 | 151 |
/-
Copyright (c) 2022 Yaël Dillies. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Yaël Dillies
-/
import Mathlib.Data.Finset.NAry
import Mathlib.Data.Finset.Slice
import Mathlib.Data.Set.Sups
/-!
# Set family operations
This file defines a few binary operations on `Finset α` for use in set family combinatorics.
## Main declarations
* `Finset.sups s t`: Finset of elements of the form `a ⊔ b` where `a ∈ s`, `b ∈ t`.
* `Finset.infs s t`: Finset of elements of the form `a ⊓ b` where `a ∈ s`, `b ∈ t`.
* `Finset.disjSups s t`: Finset of elements of the form `a ⊔ b` where `a ∈ s`, `b ∈ t` and `a`
and `b` are disjoint.
* `Finset.diffs`: Finset of elements of the form `a \ b` where `a ∈ s`, `b ∈ t`.
* `Finset.compls`: Finset of elements of the form `aᶜ` where `a ∈ s`.
## Notation
We define the following notation in locale `FinsetFamily`:
* `s ⊻ t` for `Finset.sups`
* `s ⊼ t` for `Finset.infs`
* `s ○ t` for `Finset.disjSups s t`
* `s \\ t` for `Finset.diffs`
* `sᶜˢ` for `Finset.compls`
## References
[B. Bollobás, *Combinatorics*][bollobas1986]
-/
open Function
open SetFamily
variable {F α β : Type*}
namespace Finset
section Sups
variable [DecidableEq α] [DecidableEq β]
variable [SemilatticeSup α] [SemilatticeSup β] [FunLike F α β] [SupHomClass F α β]
variable (s s₁ s₂ t t₁ t₂ u v : Finset α)
/-- `s ⊻ t` is the finset of elements of the form `a ⊔ b` where `a ∈ s`, `b ∈ t`. -/
protected def hasSups : HasSups (Finset α) :=
⟨image₂ (· ⊔ ·)⟩
scoped[FinsetFamily] attribute [instance] Finset.hasSups
open FinsetFamily
variable {s t} {a b c : α}
@[simp]
theorem mem_sups : c ∈ s ⊻ t ↔ ∃ a ∈ s, ∃ b ∈ t, a ⊔ b = c := by simp [(· ⊻ ·)]
variable (s t)
@[simp, norm_cast]
theorem coe_sups : (↑(s ⊻ t) : Set α) = ↑s ⊻ ↑t :=
coe_image₂ _ _ _
theorem card_sups_le : #(s ⊻ t) ≤ #s * #t := card_image₂_le _ _ _
theorem card_sups_iff : #(s ⊻ t) = #s * #t ↔ (s ×ˢ t : Set (α × α)).InjOn fun x => x.1 ⊔ x.2 :=
card_image₂_iff
variable {s s₁ s₂ t t₁ t₂ u}
theorem sup_mem_sups : a ∈ s → b ∈ t → a ⊔ b ∈ s ⊻ t :=
mem_image₂_of_mem
theorem sups_subset : s₁ ⊆ s₂ → t₁ ⊆ t₂ → s₁ ⊻ t₁ ⊆ s₂ ⊻ t₂ :=
image₂_subset
theorem sups_subset_left : t₁ ⊆ t₂ → s ⊻ t₁ ⊆ s ⊻ t₂ :=
image₂_subset_left
theorem sups_subset_right : s₁ ⊆ s₂ → s₁ ⊻ t ⊆ s₂ ⊻ t :=
image₂_subset_right
lemma image_subset_sups_left : b ∈ t → s.image (· ⊔ b) ⊆ s ⊻ t := image_subset_image₂_left
lemma image_subset_sups_right : a ∈ s → t.image (a ⊔ ·) ⊆ s ⊻ t := image_subset_image₂_right
theorem forall_sups_iff {p : α → Prop} : (∀ c ∈ s ⊻ t, p c) ↔ ∀ a ∈ s, ∀ b ∈ t, p (a ⊔ b) :=
forall_mem_image₂
@[simp]
theorem sups_subset_iff : s ⊻ t ⊆ u ↔ ∀ a ∈ s, ∀ b ∈ t, a ⊔ b ∈ u :=
image₂_subset_iff
@[simp]
theorem sups_nonempty : (s ⊻ t).Nonempty ↔ s.Nonempty ∧ t.Nonempty :=
image₂_nonempty_iff
@[aesop safe apply (rule_sets := [finsetNonempty])]
protected theorem Nonempty.sups : s.Nonempty → t.Nonempty → (s ⊻ t).Nonempty :=
Nonempty.image₂
theorem Nonempty.of_sups_left : (s ⊻ t).Nonempty → s.Nonempty :=
Nonempty.of_image₂_left
theorem Nonempty.of_sups_right : (s ⊻ t).Nonempty → t.Nonempty :=
Nonempty.of_image₂_right
@[simp]
theorem empty_sups : ∅ ⊻ t = ∅ :=
image₂_empty_left
@[simp]
theorem sups_empty : s ⊻ ∅ = ∅ :=
image₂_empty_right
@[simp]
theorem sups_eq_empty : s ⊻ t = ∅ ↔ s = ∅ ∨ t = ∅ :=
image₂_eq_empty_iff
@[simp] lemma singleton_sups : {a} ⊻ t = t.image (a ⊔ ·) := image₂_singleton_left
@[simp] lemma sups_singleton : s ⊻ {b} = s.image (· ⊔ b) := image₂_singleton_right
theorem singleton_sups_singleton : ({a} ⊻ {b} : Finset α) = {a ⊔ b} :=
image₂_singleton
theorem sups_union_left : (s₁ ∪ s₂) ⊻ t = s₁ ⊻ t ∪ s₂ ⊻ t :=
image₂_union_left
theorem sups_union_right : s ⊻ (t₁ ∪ t₂) = s ⊻ t₁ ∪ s ⊻ t₂ :=
image₂_union_right
theorem sups_inter_subset_left : (s₁ ∩ s₂) ⊻ t ⊆ s₁ ⊻ t ∩ s₂ ⊻ t :=
image₂_inter_subset_left
theorem sups_inter_subset_right : s ⊻ (t₁ ∩ t₂) ⊆ s ⊻ t₁ ∩ s ⊻ t₂ :=
image₂_inter_subset_right
theorem subset_sups {s t : Set α} :
↑u ⊆ s ⊻ t → ∃ s' t' : Finset α, ↑s' ⊆ s ∧ ↑t' ⊆ t ∧ u ⊆ s' ⊻ t' :=
subset_set_image₂
lemma image_sups (f : F) (s t : Finset α) : image f (s ⊻ t) = image f s ⊻ image f t :=
image_image₂_distrib <| map_sup f
lemma map_sups (f : F) (hf) (s t : Finset α) :
map ⟨f, hf⟩ (s ⊻ t) = map ⟨f, hf⟩ s ⊻ map ⟨f, hf⟩ t := by
simpa [map_eq_image] using image_sups f s t
lemma subset_sups_self : s ⊆ s ⊻ s := fun _a ha ↦ mem_sups.2 ⟨_, ha, _, ha, sup_idem _⟩
lemma sups_subset_self : s ⊻ s ⊆ s ↔ SupClosed (s : Set α) := sups_subset_iff
@[simp] lemma sups_eq_self : s ⊻ s = s ↔ SupClosed (s : Set α) := by simp [← coe_inj]
@[simp] lemma univ_sups_univ [Fintype α] : (univ : Finset α) ⊻ univ = univ := by simp
lemma filter_sups_le [DecidableLE α] (s t : Finset α) (a : α) :
{b ∈ s ⊻ t | b ≤ a} = {b ∈ s | b ≤ a} ⊻ {b ∈ t | b ≤ a} := by
simp only [← coe_inj, coe_filter, coe_sups, ← mem_coe, Set.sep_sups_le]
variable (s t u)
lemma biUnion_image_sup_left : s.biUnion (fun a ↦ t.image (a ⊔ ·)) = s ⊻ t := biUnion_image_left
lemma biUnion_image_sup_right : t.biUnion (fun b ↦ s.image (· ⊔ b)) = s ⊻ t := biUnion_image_right
theorem image_sup_product (s t : Finset α) : (s ×ˢ t).image (uncurry (· ⊔ ·)) = s ⊻ t :=
image_uncurry_product _ _ _
theorem sups_assoc : s ⊻ t ⊻ u = s ⊻ (t ⊻ u) := image₂_assoc sup_assoc
theorem sups_comm : s ⊻ t = t ⊻ s := image₂_comm sup_comm
theorem sups_left_comm : s ⊻ (t ⊻ u) = t ⊻ (s ⊻ u) :=
image₂_left_comm sup_left_comm
theorem sups_right_comm : s ⊻ t ⊻ u = s ⊻ u ⊻ t :=
image₂_right_comm sup_right_comm
theorem sups_sups_sups_comm : s ⊻ t ⊻ (u ⊻ v) = s ⊻ u ⊻ (t ⊻ v) :=
image₂_image₂_image₂_comm sup_sup_sup_comm
end Sups
section Infs
variable [DecidableEq α] [DecidableEq β]
variable [SemilatticeInf α] [SemilatticeInf β] [FunLike F α β] [InfHomClass F α β]
variable (s s₁ s₂ t t₁ t₂ u v : Finset α)
/-- `s ⊼ t` is the finset of elements of the form `a ⊓ b` where `a ∈ s`, `b ∈ t`. -/
protected def hasInfs : HasInfs (Finset α) :=
⟨image₂ (· ⊓ ·)⟩
scoped[FinsetFamily] attribute [instance] Finset.hasInfs
open FinsetFamily
variable {s t} {a b c : α}
@[simp]
theorem mem_infs : c ∈ s ⊼ t ↔ ∃ a ∈ s, ∃ b ∈ t, a ⊓ b = c := by simp [(· ⊼ ·)]
variable (s t)
@[simp, norm_cast]
theorem coe_infs : (↑(s ⊼ t) : Set α) = ↑s ⊼ ↑t :=
coe_image₂ _ _ _
theorem card_infs_le : #(s ⊼ t) ≤ #s * #t := card_image₂_le _ _ _
theorem card_infs_iff : #(s ⊼ t) = #s * #t ↔ (s ×ˢ t : Set (α × α)).InjOn fun x => x.1 ⊓ x.2 :=
card_image₂_iff
variable {s s₁ s₂ t t₁ t₂ u}
theorem inf_mem_infs : a ∈ s → b ∈ t → a ⊓ b ∈ s ⊼ t :=
mem_image₂_of_mem
theorem infs_subset : s₁ ⊆ s₂ → t₁ ⊆ t₂ → s₁ ⊼ t₁ ⊆ s₂ ⊼ t₂ :=
image₂_subset
theorem infs_subset_left : t₁ ⊆ t₂ → s ⊼ t₁ ⊆ s ⊼ t₂ :=
image₂_subset_left
theorem infs_subset_right : s₁ ⊆ s₂ → s₁ ⊼ t ⊆ s₂ ⊼ t :=
image₂_subset_right
lemma image_subset_infs_left : b ∈ t → s.image (· ⊓ b) ⊆ s ⊼ t := image_subset_image₂_left
lemma image_subset_infs_right : a ∈ s → t.image (a ⊓ ·) ⊆ s ⊼ t := image_subset_image₂_right
theorem forall_infs_iff {p : α → Prop} : (∀ c ∈ s ⊼ t, p c) ↔ ∀ a ∈ s, ∀ b ∈ t, p (a ⊓ b) :=
forall_mem_image₂
@[simp]
theorem infs_subset_iff : s ⊼ t ⊆ u ↔ ∀ a ∈ s, ∀ b ∈ t, a ⊓ b ∈ u :=
image₂_subset_iff
@[simp]
theorem infs_nonempty : (s ⊼ t).Nonempty ↔ s.Nonempty ∧ t.Nonempty :=
image₂_nonempty_iff
@[aesop safe apply (rule_sets := [finsetNonempty])]
protected theorem Nonempty.infs : s.Nonempty → t.Nonempty → (s ⊼ t).Nonempty :=
Nonempty.image₂
theorem Nonempty.of_infs_left : (s ⊼ t).Nonempty → s.Nonempty :=
Nonempty.of_image₂_left
theorem Nonempty.of_infs_right : (s ⊼ t).Nonempty → t.Nonempty :=
Nonempty.of_image₂_right
@[simp]
theorem empty_infs : ∅ ⊼ t = ∅ :=
image₂_empty_left
@[simp]
theorem infs_empty : s ⊼ ∅ = ∅ :=
image₂_empty_right
@[simp]
theorem infs_eq_empty : s ⊼ t = ∅ ↔ s = ∅ ∨ t = ∅ :=
image₂_eq_empty_iff
@[simp] lemma singleton_infs : {a} ⊼ t = t.image (a ⊓ ·) := image₂_singleton_left
@[simp] lemma infs_singleton : s ⊼ {b} = s.image (· ⊓ b) := image₂_singleton_right
theorem singleton_infs_singleton : ({a} ⊼ {b} : Finset α) = {a ⊓ b} :=
image₂_singleton
theorem infs_union_left : (s₁ ∪ s₂) ⊼ t = s₁ ⊼ t ∪ s₂ ⊼ t :=
image₂_union_left
theorem infs_union_right : s ⊼ (t₁ ∪ t₂) = s ⊼ t₁ ∪ s ⊼ t₂ :=
image₂_union_right
theorem infs_inter_subset_left : (s₁ ∩ s₂) ⊼ t ⊆ s₁ ⊼ t ∩ s₂ ⊼ t :=
image₂_inter_subset_left
theorem infs_inter_subset_right : s ⊼ (t₁ ∩ t₂) ⊆ s ⊼ t₁ ∩ s ⊼ t₂ :=
image₂_inter_subset_right
theorem subset_infs {s t : Set α} :
↑u ⊆ s ⊼ t → ∃ s' t' : Finset α, ↑s' ⊆ s ∧ ↑t' ⊆ t ∧ u ⊆ s' ⊼ t' :=
subset_set_image₂
lemma image_infs (f : F) (s t : Finset α) : image f (s ⊼ t) = image f s ⊼ image f t :=
image_image₂_distrib <| map_inf f
lemma map_infs (f : F) (hf) (s t : Finset α) :
map ⟨f, hf⟩ (s ⊼ t) = map ⟨f, hf⟩ s ⊼ map ⟨f, hf⟩ t := by
simpa [map_eq_image] using image_infs f s t
lemma subset_infs_self : s ⊆ s ⊼ s := fun _a ha ↦ mem_infs.2 ⟨_, ha, _, ha, inf_idem _⟩
lemma infs_self_subset : s ⊼ s ⊆ s ↔ InfClosed (s : Set α) := infs_subset_iff
@[simp] lemma infs_self : s ⊼ s = s ↔ InfClosed (s : Set α) := by simp [← coe_inj]
@[simp] lemma univ_infs_univ [Fintype α] : (univ : Finset α) ⊼ univ = univ := by simp
lemma filter_infs_le [DecidableLE α] (s t : Finset α) (a : α) :
{b ∈ s ⊼ t | a ≤ b} = {b ∈ s | a ≤ b} ⊼ {b ∈ t | a ≤ b} := by
simp only [← coe_inj, coe_filter, coe_infs, ← mem_coe, Set.sep_infs_le]
variable (s t u)
lemma biUnion_image_inf_left : s.biUnion (fun a ↦ t.image (a ⊓ ·)) = s ⊼ t := biUnion_image_left
lemma biUnion_image_inf_right : t.biUnion (fun b ↦ s.image (· ⊓ b)) = s ⊼ t := biUnion_image_right
theorem image_inf_product (s t : Finset α) : (s ×ˢ t).image (uncurry (· ⊓ ·)) = s ⊼ t :=
image_uncurry_product _ _ _
theorem infs_assoc : s ⊼ t ⊼ u = s ⊼ (t ⊼ u) := image₂_assoc inf_assoc
theorem infs_comm : s ⊼ t = t ⊼ s := image₂_comm inf_comm
theorem infs_left_comm : s ⊼ (t ⊼ u) = t ⊼ (s ⊼ u) :=
image₂_left_comm inf_left_comm
theorem infs_right_comm : s ⊼ t ⊼ u = s ⊼ u ⊼ t :=
image₂_right_comm inf_right_comm
theorem infs_infs_infs_comm : s ⊼ t ⊼ (u ⊼ v) = s ⊼ u ⊼ (t ⊼ v) :=
image₂_image₂_image₂_comm inf_inf_inf_comm
end Infs
open FinsetFamily
section DistribLattice
variable [DecidableEq α]
variable [DistribLattice α] (s t u : Finset α)
theorem sups_infs_subset_left : s ⊻ t ⊼ u ⊆ (s ⊻ t) ⊼ (s ⊻ u) :=
image₂_distrib_subset_left sup_inf_left
theorem sups_infs_subset_right : t ⊼ u ⊻ s ⊆ (t ⊻ s) ⊼ (u ⊻ s) :=
image₂_distrib_subset_right sup_inf_right
theorem infs_sups_subset_left : s ⊼ (t ⊻ u) ⊆ s ⊼ t ⊻ s ⊼ u :=
image₂_distrib_subset_left inf_sup_left
theorem infs_sups_subset_right : (t ⊻ u) ⊼ s ⊆ t ⊼ s ⊻ u ⊼ s :=
image₂_distrib_subset_right inf_sup_right
end DistribLattice
section Finset
variable [DecidableEq α]
variable {𝒜 ℬ : Finset (Finset α)} {s t : Finset α}
@[simp] lemma powerset_union (s t : Finset α) : (s ∪ t).powerset = s.powerset ⊻ t.powerset := by
ext u
simp only [mem_sups, mem_powerset, le_eq_subset, sup_eq_union]
refine ⟨fun h ↦ ⟨_, inter_subset_left (s₂ := u), _, inter_subset_left (s₂ := u), ?_⟩, ?_⟩
· rwa [← union_inter_distrib_right, inter_eq_right]
· rintro ⟨v, hv, w, hw, rfl⟩
exact union_subset_union hv hw
@[simp] lemma powerset_inter (s t : Finset α) : (s ∩ t).powerset = s.powerset ⊼ t.powerset := by
ext u
simp only [mem_infs, mem_powerset, le_eq_subset, inf_eq_inter]
refine ⟨fun h ↦ ⟨_, inter_subset_left (s₂ := u), _, inter_subset_left (s₂ := u), ?_⟩, ?_⟩
· rwa [← inter_inter_distrib_right, inter_eq_right]
· rintro ⟨v, hv, w, hw, rfl⟩
exact inter_subset_inter hv hw
@[simp] lemma powerset_sups_powerset_self (s : Finset α) :
s.powerset ⊻ s.powerset = s.powerset := by simp [← powerset_union]
@[simp] lemma powerset_infs_powerset_self (s : Finset α) :
s.powerset ⊼ s.powerset = s.powerset := by simp [← powerset_inter]
lemma union_mem_sups : s ∈ 𝒜 → t ∈ ℬ → s ∪ t ∈ 𝒜 ⊻ ℬ := sup_mem_sups
lemma inter_mem_infs : s ∈ 𝒜 → t ∈ ℬ → s ∩ t ∈ 𝒜 ⊼ ℬ := inf_mem_infs
end Finset
section DisjSups
variable [DecidableEq α]
variable [SemilatticeSup α] [OrderBot α] [DecidableRel (α := α) Disjoint]
(s s₁ s₂ t t₁ t₂ u : Finset α)
/-- The finset of elements of the form `a ⊔ b` where `a ∈ s`, `b ∈ t` and `a` and `b` are disjoint.
-/
def disjSups : Finset α := {ab ∈ s ×ˢ t | Disjoint ab.1 ab.2}.image fun ab => ab.1 ⊔ ab.2
@[inherit_doc]
scoped[FinsetFamily] infixl:74 " ○ " => Finset.disjSups
open FinsetFamily
variable {s t u} {a b c : α}
@[simp]
theorem mem_disjSups : c ∈ s ○ t ↔ ∃ a ∈ s, ∃ b ∈ t, Disjoint a b ∧ a ⊔ b = c := by
simp [disjSups, and_assoc]
theorem disjSups_subset_sups : s ○ t ⊆ s ⊻ t := by
simp_rw [subset_iff, mem_sups, mem_disjSups]
exact fun c ⟨a, b, ha, hb, _, hc⟩ => ⟨a, b, ha, hb, hc⟩
variable (s t)
theorem card_disjSups_le : #(s ○ t) ≤ #s * #t :=
(card_le_card disjSups_subset_sups).trans <| card_sups_le _ _
variable {s s₁ s₂ t t₁ t₂}
theorem disjSups_subset (hs : s₁ ⊆ s₂) (ht : t₁ ⊆ t₂) : s₁ ○ t₁ ⊆ s₂ ○ t₂ :=
image_subset_image <| filter_subset_filter _ <| product_subset_product hs ht
theorem disjSups_subset_left (ht : t₁ ⊆ t₂) : s ○ t₁ ⊆ s ○ t₂ :=
disjSups_subset Subset.rfl ht
theorem disjSups_subset_right (hs : s₁ ⊆ s₂) : s₁ ○ t ⊆ s₂ ○ t :=
disjSups_subset hs Subset.rfl
theorem forall_disjSups_iff {p : α → Prop} :
(∀ c ∈ s ○ t, p c) ↔ ∀ a ∈ s, ∀ b ∈ t, Disjoint a b → p (a ⊔ b) := by
simp_rw [mem_disjSups]
refine ⟨fun h a ha b hb hab => h _ ⟨_, ha, _, hb, hab, rfl⟩, ?_⟩
rintro h _ ⟨a, ha, b, hb, hab, rfl⟩
exact h _ ha _ hb hab
@[simp]
theorem disjSups_subset_iff : s ○ t ⊆ u ↔ ∀ a ∈ s, ∀ b ∈ t, Disjoint a b → a ⊔ b ∈ u :=
forall_disjSups_iff
theorem Nonempty.of_disjSups_left : (s ○ t).Nonempty → s.Nonempty := by
simp_rw [Finset.Nonempty, mem_disjSups]
exact fun ⟨_, a, ha, _⟩ => ⟨a, ha⟩
theorem Nonempty.of_disjSups_right : (s ○ t).Nonempty → t.Nonempty := by
simp_rw [Finset.Nonempty, mem_disjSups]
exact fun ⟨_, _, _, b, hb, _⟩ => ⟨b, hb⟩
@[simp]
theorem disjSups_empty_left : ∅ ○ t = ∅ := by simp [disjSups]
@[simp]
theorem disjSups_empty_right : s ○ ∅ = ∅ := by simp [disjSups]
theorem disjSups_singleton : ({a} ○ {b} : Finset α) = if Disjoint a b then {a ⊔ b} else ∅ := by
split_ifs with h <;> simp [disjSups, filter_singleton, h]
theorem disjSups_union_left : (s₁ ∪ s₂) ○ t = s₁ ○ t ∪ s₂ ○ t := by
simp [disjSups, filter_union, image_union]
theorem disjSups_union_right : s ○ (t₁ ∪ t₂) = s ○ t₁ ∪ s ○ t₂ := by
simp [disjSups, filter_union, image_union]
theorem disjSups_inter_subset_left : (s₁ ∩ s₂) ○ t ⊆ s₁ ○ t ∩ s₂ ○ t := by
simpa only [disjSups, inter_product, filter_inter_distrib] using image_inter_subset _ _ _
theorem disjSups_inter_subset_right : s ○ (t₁ ∩ t₂) ⊆ s ○ t₁ ∩ s ○ t₂ := by
simpa only [disjSups, product_inter, filter_inter_distrib] using image_inter_subset _ _ _
variable (s t)
theorem disjSups_comm : s ○ t = t ○ s := by
aesop (add simp disjoint_comm, simp sup_comm)
instance : @Std.Commutative (Finset α) (· ○ ·) := ⟨disjSups_comm⟩
end DisjSups
open FinsetFamily
section DistribLattice
variable [DecidableEq α]
variable [DistribLattice α] [OrderBot α] [DecidableRel (α := α) Disjoint] (s t u v : Finset α)
theorem disjSups_assoc : ∀ s t u : Finset α, s ○ t ○ u = s ○ (t ○ u) := by
refine (associative_of_commutative_of_le inferInstance ?_).assoc
simp only [le_eq_subset, disjSups_subset_iff, mem_disjSups]
rintro s t u _ ⟨a, ha, b, hb, hab, rfl⟩ c hc habc
rw [disjoint_sup_left] at habc
exact ⟨a, ha, _, ⟨b, hb, c, hc, habc.2, rfl⟩, hab.sup_right habc.1, (sup_assoc ..).symm⟩
instance : @Std.Associative (Finset α) (· ○ ·) := ⟨disjSups_assoc⟩
theorem disjSups_left_comm : s ○ (t ○ u) = t ○ (s ○ u) := by
simp_rw [← disjSups_assoc, disjSups_comm s]
theorem disjSups_right_comm : s ○ t ○ u = s ○ u ○ t := by simp_rw [disjSups_assoc, disjSups_comm]
theorem disjSups_disjSups_disjSups_comm : s ○ t ○ (u ○ v) = s ○ u ○ (t ○ v) := by
simp_rw [← disjSups_assoc, disjSups_right_comm]
end DistribLattice
section Diffs
variable [DecidableEq α]
variable [GeneralizedBooleanAlgebra α] (s s₁ s₂ t t₁ t₂ u : Finset α)
/-- `s \\ t` is the finset of elements of the form `a \ b` where `a ∈ s`, `b ∈ t`. -/
def diffs : Finset α → Finset α → Finset α := image₂ (· \ ·)
@[inherit_doc]
scoped[FinsetFamily] infixl:74 " \\\\ " => Finset.diffs
-- This notation is meant to have higher precedence than `\` and `⊓`, but still within the
-- realm of other binary notation
open FinsetFamily
variable {s t} {a b c : α}
@[simp] lemma mem_diffs : c ∈ s \\ t ↔ ∃ a ∈ s, ∃ b ∈ t, a \ b = c := by simp [(· \\ ·)]
variable (s t)
@[simp, norm_cast] lemma coe_diffs : (↑(s \\ t) : Set α) = Set.image2 (· \ ·) s t :=
coe_image₂ _ _ _
lemma card_diffs_le : #(s \\ t) ≤ #s * #t := card_image₂_le _ _ _
lemma card_diffs_iff : #(s \\ t) = #s * #t ↔ (s ×ˢ t : Set (α × α)).InjOn fun x ↦ x.1 \ x.2 :=
card_image₂_iff
variable {s s₁ s₂ t t₁ t₂ u}
lemma sdiff_mem_diffs : a ∈ s → b ∈ t → a \ b ∈ s \\ t := mem_image₂_of_mem
lemma diffs_subset : s₁ ⊆ s₂ → t₁ ⊆ t₂ → s₁ \\ t₁ ⊆ s₂ \\ t₂ := image₂_subset
lemma diffs_subset_left : t₁ ⊆ t₂ → s \\ t₁ ⊆ s \\ t₂ := image₂_subset_left
lemma diffs_subset_right : s₁ ⊆ s₂ → s₁ \\ t ⊆ s₂ \\ t := image₂_subset_right
lemma image_subset_diffs_left : b ∈ t → s.image (· \ b) ⊆ s \\ t := image_subset_image₂_left
lemma image_subset_diffs_right : a ∈ s → t.image (a \ ·) ⊆ s \\ t := image_subset_image₂_right
lemma forall_mem_diffs {p : α → Prop} : (∀ c ∈ s \\ t, p c) ↔ ∀ a ∈ s, ∀ b ∈ t, p (a \ b) :=
forall_mem_image₂
@[simp] lemma diffs_subset_iff : s \\ t ⊆ u ↔ ∀ a ∈ s, ∀ b ∈ t, a \ b ∈ u := image₂_subset_iff
@[simp]
lemma diffs_nonempty : (s \\ t).Nonempty ↔ s.Nonempty ∧ t.Nonempty := image₂_nonempty_iff
@[aesop safe apply (rule_sets := [finsetNonempty])]
protected lemma Nonempty.diffs : s.Nonempty → t.Nonempty → (s \\ t).Nonempty := Nonempty.image₂
lemma Nonempty.of_diffs_left : (s \\ t).Nonempty → s.Nonempty := Nonempty.of_image₂_left
lemma Nonempty.of_diffs_right : (s \\ t).Nonempty → t.Nonempty := Nonempty.of_image₂_right
@[simp] lemma empty_diffs : ∅ \\ t = ∅ := image₂_empty_left
@[simp] lemma diffs_empty : s \\ ∅ = ∅ := image₂_empty_right
@[simp] lemma diffs_eq_empty : s \\ t = ∅ ↔ s = ∅ ∨ t = ∅ := image₂_eq_empty_iff
@[simp] lemma singleton_diffs : {a} \\ t = t.image (a \ ·) := image₂_singleton_left
@[simp] lemma diffs_singleton : s \\ {b} = s.image (· \ b) := image₂_singleton_right
lemma singleton_diffs_singleton : ({a} \\ {b} : Finset α) = {a \ b} := image₂_singleton
lemma diffs_union_left : (s₁ ∪ s₂) \\ t = s₁ \\ t ∪ s₂ \\ t := image₂_union_left
lemma diffs_union_right : s \\ (t₁ ∪ t₂) = s \\ t₁ ∪ s \\ t₂ := image₂_union_right
lemma diffs_inter_subset_left : (s₁ ∩ s₂) \\ t ⊆ s₁ \\ t ∩ s₂ \\ t := image₂_inter_subset_left
lemma diffs_inter_subset_right : s \\ (t₁ ∩ t₂) ⊆ s \\ t₁ ∩ s \\ t₂ := image₂_inter_subset_right
lemma subset_diffs {s t : Set α} :
↑u ⊆ Set.image2 (· \ ·) s t → ∃ s' t' : Finset α, ↑s' ⊆ s ∧ ↑t' ⊆ t ∧ u ⊆ s' \\ t' :=
subset_set_image₂
variable (s t u)
lemma biUnion_image_sdiff_left : s.biUnion (fun a ↦ t.image (a \ ·)) = s \\ t := biUnion_image_left
lemma biUnion_image_sdiff_right : t.biUnion (fun b ↦ s.image (· \ b)) = s \\ t :=
biUnion_image_right
lemma image_sdiff_product (s t : Finset α) : (s ×ˢ t).image (uncurry (· \ ·)) = s \\ t :=
image_uncurry_product _ _ _
lemma diffs_right_comm : s \\ t \\ u = s \\ u \\ t := image₂_right_comm sdiff_right_comm
end Diffs
section Compls
variable [BooleanAlgebra α] (s s₁ s₂ t : Finset α)
/-- `sᶜˢ` is the finset of elements of the form `aᶜ` where `a ∈ s`. -/
def compls : Finset α → Finset α := map ⟨compl, compl_injective⟩
@[inherit_doc]
scoped[FinsetFamily] postfix:max "ᶜˢ" => Finset.compls
open FinsetFamily
variable {s t} {a : α}
@[simp] lemma mem_compls : a ∈ sᶜˢ ↔ aᶜ ∈ s := by
rw [Iff.comm, ← mem_map' ⟨compl, compl_injective⟩, Embedding.coeFn_mk, compl_compl, compls]
| variable (s t)
| Mathlib/Data/Finset/Sups.lean | 602 | 602 |
/-
Copyright (c) 2018 Mario Carneiro. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Mario Carneiro
-/
import Mathlib.Computability.Tape
import Mathlib.Data.Fintype.Option
import Mathlib.Data.Fintype.Prod
import Mathlib.Data.Fintype.Pi
import Mathlib.Data.PFun
import Mathlib.Computability.PostTuringMachine
/-!
# Turing machines
The files `PostTuringMachine.lean` and `TuringMachine.lean` define
a sequence of simple machine languages, starting with Turing machines and working
up to more complex languages based on Wang B-machines.
`PostTuringMachine.lean` covers the TM0 model and TM1 model;
`TuringMachine.lean` adds the TM2 model.
## Naming conventions
Each model of computation in this file shares a naming convention for the elements of a model of
computation. These are the parameters for the language:
* `Γ` is the alphabet on the tape.
* `Λ` is the set of labels, or internal machine states.
* `σ` is the type of internal memory, not on the tape. This does not exist in the TM0 model, and
later models achieve this by mixing it into `Λ`.
* `K` is used in the TM2 model, which has multiple stacks, and denotes the number of such stacks.
All of these variables denote "essentially finite" types, but for technical reasons it is
convenient to allow them to be infinite anyway. When using an infinite type, we will be interested
to prove that only finitely many values of the type are ever interacted with.
Given these parameters, there are a few common structures for the model that arise:
* `Stmt` is the set of all actions that can be performed in one step. For the TM0 model this set is
finite, and for later models it is an infinite inductive type representing "possible program
texts".
* `Cfg` is the set of instantaneous configurations, that is, the state of the machine together with
its environment.
* `Machine` is the set of all machines in the model. Usually this is approximately a function
`Λ → Stmt`, although different models have different ways of halting and other actions.
* `step : Cfg → Option Cfg` is the function that describes how the state evolves over one step.
If `step c = none`, then `c` is a terminal state, and the result of the computation is read off
from `c`. Because of the type of `step`, these models are all deterministic by construction.
* `init : Input → Cfg` sets up the initial state. The type `Input` depends on the model;
in most cases it is `List Γ`.
* `eval : Machine → Input → Part Output`, given a machine `M` and input `i`, starts from
`init i`, runs `step` until it reaches an output, and then applies a function `Cfg → Output` to
the final state to obtain the result. The type `Output` depends on the model.
* `Supports : Machine → Finset Λ → Prop` asserts that a machine `M` starts in `S : Finset Λ`, and
can only ever jump to other states inside `S`. This implies that the behavior of `M` on any input
cannot depend on its values outside `S`. We use this to allow `Λ` to be an infinite set when
convenient, and prove that only finitely many of these states are actually accessible. This
formalizes "essentially finite" mentioned above.
-/
assert_not_exists MonoidWithZero
open List (Vector)
open Relation
open Nat (iterate)
open Function (update iterate_succ iterate_succ_apply iterate_succ' iterate_succ_apply'
iterate_zero_apply)
namespace Turing
/-!
## The TM2 model
The TM2 model removes the tape entirely from the TM1 model, replacing it with an arbitrary (finite)
collection of stacks, each with elements of different types (the alphabet of stack `k : K` is
`Γ k`). The statements are:
* `push k (f : σ → Γ k) q` puts `f a` on the `k`-th stack, then does `q`.
* `pop k (f : σ → Option (Γ k) → σ) q` changes the state to `f a (S k).head`, where `S k` is the
value of the `k`-th stack, and removes this element from the stack, then does `q`.
* `peek k (f : σ → Option (Γ k) → σ) q` changes the state to `f a (S k).head`, where `S k` is the
value of the `k`-th stack, then does `q`.
* `load (f : σ → σ) q` reads nothing but applies `f` to the internal state, then does `q`.
* `branch (f : σ → Bool) qtrue qfalse` does `qtrue` or `qfalse` according to `f a`.
* `goto (f : σ → Λ)` jumps to label `f a`.
* `halt` halts on the next step.
The configuration is a tuple `(l, var, stk)` where `l : Option Λ` is the current label to run or
`none` for the halting state, `var : σ` is the (finite) internal state, and `stk : ∀ k, List (Γ k)`
is the collection of stacks. (Note that unlike the `TM0` and `TM1` models, these are not
`ListBlank`s, they have definite ends that can be detected by the `pop` command.)
Given a designated stack `k` and a value `L : List (Γ k)`, the initial configuration has all the
stacks empty except the designated "input" stack; in `eval` this designated stack also functions
as the output stack.
-/
namespace TM2
variable {K : Type*}
-- Index type of stacks
variable (Γ : K → Type*)
-- Type of stack elements
variable (Λ : Type*)
-- Type of function labels
variable (σ : Type*)
-- Type of variable settings
/-- The TM2 model removes the tape entirely from the TM1 model,
replacing it with an arbitrary (finite) collection of stacks.
The operation `push` puts an element on one of the stacks,
and `pop` removes an element from a stack (and modifying the
internal state based on the result). `peek` modifies the
internal state but does not remove an element. -/
inductive Stmt
| push : ∀ k, (σ → Γ k) → Stmt → Stmt
| peek : ∀ k, (σ → Option (Γ k) → σ) → Stmt → Stmt
| pop : ∀ k, (σ → Option (Γ k) → σ) → Stmt → Stmt
| load : (σ → σ) → Stmt → Stmt
| branch : (σ → Bool) → Stmt → Stmt → Stmt
| goto : (σ → Λ) → Stmt
| halt : Stmt
open Stmt
instance Stmt.inhabited : Inhabited (Stmt Γ Λ σ) :=
⟨halt⟩
/-- A configuration in the TM2 model is a label (or `none` for the halt state), the state of
local variables, and the stacks. (Note that the stacks are not `ListBlank`s, they have a definite
size.) -/
structure Cfg where
/-- The current label to run (or `none` for the halting state) -/
l : Option Λ
/-- The internal state -/
var : σ
/-- The (finite) collection of internal stacks -/
stk : ∀ k, List (Γ k)
instance Cfg.inhabited [Inhabited σ] : Inhabited (Cfg Γ Λ σ) :=
⟨⟨default, default, default⟩⟩
variable {Γ Λ σ}
section
variable [DecidableEq K]
/-- The step function for the TM2 model. -/
def stepAux : Stmt Γ Λ σ → σ → (∀ k, List (Γ k)) → Cfg Γ Λ σ
| push k f q, v, S => stepAux q v (update S k (f v :: S k))
| peek k f q, v, S => stepAux q (f v (S k).head?) S
| pop k f q, v, S => stepAux q (f v (S k).head?) (update S k (S k).tail)
| load a q, v, S => stepAux q (a v) S
| branch f q₁ q₂, v, S => cond (f v) (stepAux q₁ v S) (stepAux q₂ v S)
| goto f, v, S => ⟨some (f v), v, S⟩
| halt, v, S => ⟨none, v, S⟩
/-- The step function for the TM2 model. -/
def step (M : Λ → Stmt Γ Λ σ) : Cfg Γ Λ σ → Option (Cfg Γ Λ σ)
| ⟨none, _, _⟩ => none
| ⟨some l, v, S⟩ => some (stepAux (M l) v S)
attribute [simp] stepAux.eq_1 stepAux.eq_2 stepAux.eq_3
stepAux.eq_4 stepAux.eq_5 stepAux.eq_6 stepAux.eq_7 step.eq_1 step.eq_2
/-- The (reflexive) reachability relation for the TM2 model. -/
def Reaches (M : Λ → Stmt Γ Λ σ) : Cfg Γ Λ σ → Cfg Γ Λ σ → Prop :=
ReflTransGen fun a b ↦ b ∈ step M a
end
/-- Given a set `S` of states, `SupportsStmt S q` means that `q` only jumps to states in `S`. -/
def SupportsStmt (S : Finset Λ) : Stmt Γ Λ σ → Prop
| push _ _ q => SupportsStmt S q
| peek _ _ q => SupportsStmt S q
| pop _ _ q => SupportsStmt S q
| load _ q => SupportsStmt S q
| branch _ q₁ q₂ => SupportsStmt S q₁ ∧ SupportsStmt S q₂
| goto l => ∀ v, l v ∈ S
| halt => True
section
open scoped Classical in
/-- The set of subtree statements in a statement. -/
noncomputable def stmts₁ : Stmt Γ Λ σ → Finset (Stmt Γ Λ σ)
| Q@(push _ _ q) => insert Q (stmts₁ q)
| Q@(peek _ _ q) => insert Q (stmts₁ q)
| Q@(pop _ _ q) => insert Q (stmts₁ q)
| Q@(load _ q) => insert Q (stmts₁ q)
| Q@(branch _ q₁ q₂) => insert Q (stmts₁ q₁ ∪ stmts₁ q₂)
| Q@(goto _) => {Q}
| Q@halt => {Q}
theorem stmts₁_self {q : Stmt Γ Λ σ} : q ∈ stmts₁ q := by
cases q <;> simp only [Finset.mem_insert_self, Finset.mem_singleton_self, stmts₁]
theorem stmts₁_trans {q₁ q₂ : Stmt Γ Λ σ} : q₁ ∈ stmts₁ q₂ → stmts₁ q₁ ⊆ stmts₁ q₂ := by
classical
intro h₁₂ q₀ h₀₁
induction q₂ with (
simp only [stmts₁] at h₁₂ ⊢
simp only [Finset.mem_insert, Finset.mem_singleton, Finset.mem_union] at h₁₂)
| branch f q₁ q₂ IH₁ IH₂ =>
rcases h₁₂ with (rfl | h₁₂ | h₁₂)
· unfold stmts₁ at h₀₁
exact h₀₁
· exact Finset.mem_insert_of_mem (Finset.mem_union_left _ (IH₁ h₁₂))
· exact Finset.mem_insert_of_mem (Finset.mem_union_right _ (IH₂ h₁₂))
| goto l => subst h₁₂; exact h₀₁
| halt => subst h₁₂; exact h₀₁
| load _ q IH | _ _ _ q IH =>
rcases h₁₂ with (rfl | h₁₂)
· unfold stmts₁ at h₀₁
exact h₀₁
· exact Finset.mem_insert_of_mem (IH h₁₂)
theorem stmts₁_supportsStmt_mono {S : Finset Λ} {q₁ q₂ : Stmt Γ Λ σ} (h : q₁ ∈ stmts₁ q₂)
(hs : SupportsStmt S q₂) : SupportsStmt S q₁ := by
induction q₂ with
simp only [stmts₁, SupportsStmt, Finset.mem_insert, Finset.mem_union, Finset.mem_singleton]
at h hs
| branch f q₁ q₂ IH₁ IH₂ => rcases h with (rfl | h | h); exacts [hs, IH₁ h hs.1, IH₂ h hs.2]
| goto l => subst h; exact hs
| halt => subst h; trivial
| load _ _ IH | _ _ _ _ IH => rcases h with (rfl | h) <;> [exact hs; exact IH h hs]
open scoped Classical in
/-- The set of statements accessible from initial set `S` of labels. -/
noncomputable def stmts (M : Λ → Stmt Γ Λ σ) (S : Finset Λ) : Finset (Option (Stmt Γ Λ σ)) :=
Finset.insertNone (S.biUnion fun q ↦ stmts₁ (M q))
theorem stmts_trans {M : Λ → Stmt Γ Λ σ} {S : Finset Λ} {q₁ q₂ : Stmt Γ Λ σ} (h₁ : q₁ ∈ stmts₁ q₂) :
some q₂ ∈ stmts M S → some q₁ ∈ stmts M S := by
simp only [stmts, Finset.mem_insertNone, Finset.mem_biUnion, Option.mem_def, Option.some.injEq,
forall_eq', exists_imp, and_imp]
exact fun l ls h₂ ↦ ⟨_, ls, stmts₁_trans h₂ h₁⟩
end
variable [Inhabited Λ]
/-- Given a TM2 machine `M` and a set `S` of states, `Supports M S` means that all states in
`S` jump only to other states in `S`. -/
def Supports (M : Λ → Stmt Γ Λ σ) (S : Finset Λ) :=
default ∈ S ∧ ∀ q ∈ S, SupportsStmt S (M q)
theorem stmts_supportsStmt {M : Λ → Stmt Γ Λ σ} {S : Finset Λ} {q : Stmt Γ Λ σ}
(ss : Supports M S) : some q ∈ stmts M S → SupportsStmt S q := by
simp only [stmts, Finset.mem_insertNone, Finset.mem_biUnion, Option.mem_def, Option.some.injEq,
forall_eq', exists_imp, and_imp]
exact fun l ls h ↦ stmts₁_supportsStmt_mono h (ss.2 _ ls)
variable [DecidableEq K]
theorem step_supports (M : Λ → Stmt Γ Λ σ) {S : Finset Λ} (ss : Supports M S) :
∀ {c c' : Cfg Γ Λ σ}, c' ∈ step M c → c.l ∈ Finset.insertNone S → c'.l ∈ Finset.insertNone S
| ⟨some l₁, v, T⟩, c', h₁, h₂ => by
replace h₂ := ss.2 _ (Finset.some_mem_insertNone.1 h₂)
simp only [step, Option.mem_def, Option.some.injEq] at h₁; subst c'
revert h₂; induction M l₁ generalizing v T with intro hs
| branch p q₁' q₂' IH₁ IH₂ =>
unfold stepAux; cases p v
· exact IH₂ _ _ hs.2
· exact IH₁ _ _ hs.1
| goto => exact Finset.some_mem_insertNone.2 (hs _)
| halt => apply Multiset.mem_cons_self
| load _ _ IH | _ _ _ _ IH => exact IH _ _ hs
variable [Inhabited σ]
/-- The initial state of the TM2 model. The input is provided on a designated stack. -/
def init (k : K) (L : List (Γ k)) : Cfg Γ Λ σ :=
⟨some default, default, update (fun _ ↦ []) k L⟩
/-- Evaluates a TM2 program to completion, with the output on the same stack as the input. -/
def eval (M : Λ → Stmt Γ Λ σ) (k : K) (L : List (Γ k)) : Part (List (Γ k)) :=
(Turing.eval (step M) (init k L)).map fun c ↦ c.stk k
end TM2
/-!
## TM2 emulator in TM1
To prove that TM2 computable functions are TM1 computable, we need to reduce each TM2 program to a
TM1 program. So suppose a TM2 program is given. This program has to maintain a whole collection of
stacks, but we have only one tape, so we must "multiplex" them all together. Pictorially, if stack
1 contains `[a, b]` and stack 2 contains `[c, d, e, f]` then the tape looks like this:
```
bottom: ... | _ | T | _ | _ | _ | _ | ...
stack 1: ... | _ | b | a | _ | _ | _ | ...
stack 2: ... | _ | f | e | d | c | _ | ...
```
where a tape element is a vertical slice through the diagram. Here the alphabet is
`Γ' := Bool × ∀ k, Option (Γ k)`, where:
* `bottom : Bool` is marked only in one place, the initial position of the TM, and represents the
tail of all stacks. It is never modified.
* `stk k : Option (Γ k)` is the value of the `k`-th stack, if in range, otherwise `none` (which is
the blank value). Note that the head of the stack is at the far end; this is so that push and pop
don't have to do any shifting.
In "resting" position, the TM is sitting at the position marked `bottom`. For non-stack actions,
it operates in place, but for the stack actions `push`, `peek`, and `pop`, it must shuttle to the
end of the appropriate stack, make its changes, and then return to the bottom. So the states are:
* `normal (l : Λ)`: waiting at `bottom` to execute function `l`
* `go k (s : StAct k) (q : Stmt₂)`: travelling to the right to get to the end of stack `k` in
order to perform stack action `s`, and later continue with executing `q`
* `ret (q : Stmt₂)`: travelling to the left after having performed a stack action, and executing
`q` once we arrive
Because of the shuttling, emulation overhead is `O(n)`, where `n` is the current maximum of the
length of all stacks. Therefore a program that takes `k` steps to run in TM2 takes `O((m+k)k)`
steps to run when emulated in TM1, where `m` is the length of the input.
-/
namespace TM2to1
-- A displaced lemma proved in unnecessary generality
theorem stk_nth_val {K : Type*} {Γ : K → Type*} {L : ListBlank (∀ k, Option (Γ k))} {k S} (n)
(hL : ListBlank.map (proj k) L = ListBlank.mk (List.map some S).reverse) :
L.nth n k = S.reverse[n]? := by
rw [← proj_map_nth, hL, ← List.map_reverse, ListBlank.nth_mk,
List.getI_eq_iget_getElem?, List.getElem?_map]
cases S.reverse[n]? <;> rfl
variable (K : Type*)
variable (Γ : K → Type*)
variable {Λ σ : Type*}
/-- The alphabet of the TM2 simulator on TM1 is a marker for the stack bottom,
plus a vector of stack elements for each stack, or none if the stack does not extend this far. -/
def Γ' :=
Bool × ∀ k, Option (Γ k)
variable {K Γ}
instance Γ'.inhabited : Inhabited (Γ' K Γ) :=
⟨⟨false, fun _ ↦ none⟩⟩
instance Γ'.fintype [DecidableEq K] [Fintype K] [∀ k, Fintype (Γ k)] : Fintype (Γ' K Γ) :=
instFintypeProd _ _
/-- The bottom marker is fixed throughout the calculation, so we use the `addBottom` function
to express the program state in terms of a tape with only the stacks themselves. -/
def addBottom (L : ListBlank (∀ k, Option (Γ k))) : ListBlank (Γ' K Γ) :=
ListBlank.cons (true, L.head) (L.tail.map ⟨Prod.mk false, rfl⟩)
theorem addBottom_map (L : ListBlank (∀ k, Option (Γ k))) :
(addBottom L).map ⟨Prod.snd, by rfl⟩ = L := by
simp only [addBottom, ListBlank.map_cons]
convert ListBlank.cons_head_tail L
generalize ListBlank.tail L = L'
refine L'.induction_on fun l ↦ ?_; simp
theorem addBottom_modifyNth (f : (∀ k, Option (Γ k)) → ∀ k, Option (Γ k))
(L : ListBlank (∀ k, Option (Γ k))) (n : ℕ) :
(addBottom L).modifyNth (fun a ↦ (a.1, f a.2)) n = addBottom (L.modifyNth f n) := by
cases n <;>
simp only [addBottom, ListBlank.head_cons, ListBlank.modifyNth, ListBlank.tail_cons]
congr; symm; apply ListBlank.map_modifyNth; intro; rfl
theorem addBottom_nth_snd (L : ListBlank (∀ k, Option (Γ k))) (n : ℕ) :
((addBottom L).nth n).2 = L.nth n := by
conv => rhs; rw [← addBottom_map L, ListBlank.nth_map]
theorem addBottom_nth_succ_fst (L : ListBlank (∀ k, Option (Γ k))) (n : ℕ) :
((addBottom L).nth (n + 1)).1 = false := by
rw [ListBlank.nth_succ, addBottom, ListBlank.tail_cons, ListBlank.nth_map]
theorem addBottom_head_fst (L : ListBlank (∀ k, Option (Γ k))) : (addBottom L).head.1 = true := by
rw [addBottom, ListBlank.head_cons]
variable (K Γ σ) in
/-- A stack action is a command that interacts with the top of a stack. Our default position
is at the bottom of all the stacks, so we have to hold on to this action while going to the end
to modify the stack. -/
inductive StAct (k : K)
| push : (σ → Γ k) → StAct k
| peek : (σ → Option (Γ k) → σ) → StAct k
| pop : (σ → Option (Γ k) → σ) → StAct k
instance StAct.inhabited {k : K} : Inhabited (StAct K Γ σ k) :=
⟨StAct.peek fun s _ ↦ s⟩
section
open StAct
/-- The TM2 statement corresponding to a stack action. -/
def stRun {k : K} : StAct K Γ σ k → TM2.Stmt Γ Λ σ → TM2.Stmt Γ Λ σ
| push f => TM2.Stmt.push k f
| peek f => TM2.Stmt.peek k f
| pop f => TM2.Stmt.pop k f
/-- The effect of a stack action on the local variables, given the value of the stack. -/
def stVar {k : K} (v : σ) (l : List (Γ k)) : StAct K Γ σ k → σ
| push _ => v
| peek f => f v l.head?
| pop f => f v l.head?
/-- The effect of a stack action on the stack. -/
def stWrite {k : K} (v : σ) (l : List (Γ k)) : StAct K Γ σ k → List (Γ k)
| push f => f v :: l
| peek _ => l
| pop _ => l.tail
/-- We have partitioned the TM2 statements into "stack actions", which require going to the end
of the stack, and all other actions, which do not. This is a modified recursor which lumps the
stack actions into one. -/
@[elab_as_elim]
def stmtStRec.{l} {motive : TM2.Stmt Γ Λ σ → Sort l}
(run : ∀ (k) (s : StAct K Γ σ k) (q) (_ : motive q), motive (stRun s q))
(load : ∀ (a q) (_ : motive q), motive (TM2.Stmt.load a q))
(branch : ∀ (p q₁ q₂) (_ : motive q₁) (_ : motive q₂), motive (TM2.Stmt.branch p q₁ q₂))
(goto : ∀ l, motive (TM2.Stmt.goto l)) (halt : motive TM2.Stmt.halt) : ∀ n, motive n
| TM2.Stmt.push _ f q => run _ (push f) _ (stmtStRec run load branch goto halt q)
| TM2.Stmt.peek _ f q => run _ (peek f) _ (stmtStRec run load branch goto halt q)
| TM2.Stmt.pop _ f q => run _ (pop f) _ (stmtStRec run load branch goto halt q)
| TM2.Stmt.load _ q => load _ _ (stmtStRec run load branch goto halt q)
| TM2.Stmt.branch _ q₁ q₂ =>
branch _ _ _ (stmtStRec run load branch goto halt q₁) (stmtStRec run load branch goto halt q₂)
| TM2.Stmt.goto _ => goto _
| TM2.Stmt.halt => halt
theorem supports_run (S : Finset Λ) {k : K} (s : StAct K Γ σ k) (q : TM2.Stmt Γ Λ σ) :
TM2.SupportsStmt S (stRun s q) ↔ TM2.SupportsStmt S q := by
cases s <;> rfl
end
variable (K Γ Λ σ)
/-- The machine states of the TM2 emulator. We can either be in a normal state when waiting for the
next TM2 action, or we can be in the "go" and "return" states to go to the top of the stack and
return to the bottom, respectively. -/
inductive Λ'
| normal : Λ → Λ'
| go (k : K) : StAct K Γ σ k → TM2.Stmt Γ Λ σ → Λ'
| ret : TM2.Stmt Γ Λ σ → Λ'
variable {K Γ Λ σ}
open Λ'
instance Λ'.inhabited [Inhabited Λ] : Inhabited (Λ' K Γ Λ σ) :=
⟨normal default⟩
open TM1.Stmt
section
variable [DecidableEq K]
/-- The program corresponding to state transitions at the end of a stack. Here we start out just
after the top of the stack, and should end just after the new top of the stack. -/
def trStAct {k : K} (q : TM1.Stmt (Γ' K Γ) (Λ' K Γ Λ σ) σ) :
StAct K Γ σ k → TM1.Stmt (Γ' K Γ) (Λ' K Γ Λ σ) σ
| StAct.push f => (write fun a s ↦ (a.1, update a.2 k <| some <| f s)) <| move Dir.right q
| StAct.peek f => move Dir.left <| (load fun a s ↦ f s (a.2 k)) <| move Dir.right q
| StAct.pop f =>
branch (fun a _ ↦ a.1) (load (fun _ s ↦ f s none) q)
(move Dir.left <|
(load fun a s ↦ f s (a.2 k)) <| write (fun a _ ↦ (a.1, update a.2 k none)) q)
/-- The initial state for the TM2 emulator, given an initial TM2 state. All stacks start out empty
except for the input stack, and the stack bottom mark is set at the head. -/
def trInit (k : K) (L : List (Γ k)) : List (Γ' K Γ) :=
let L' : List (Γ' K Γ) := L.reverse.map fun a ↦ (false, update (fun _ ↦ none) k (some a))
(true, L'.headI.2) :: L'.tail
theorem step_run {k : K} (q : TM2.Stmt Γ Λ σ) (v : σ) (S : ∀ k, List (Γ k)) : ∀ s : StAct K Γ σ k,
TM2.stepAux (stRun s q) v S = TM2.stepAux q (stVar v (S k) s) (update S k (stWrite v (S k) s))
| StAct.push _ => rfl
| StAct.peek f => by unfold stWrite; rw [Function.update_eq_self]; rfl
| StAct.pop _ => rfl
end
/-- The translation of TM2 statements to TM1 statements. regular actions have direct equivalents,
but stack actions are deferred by going to the corresponding `go` state, so that we can find the
appropriate stack top. -/
def trNormal : TM2.Stmt Γ Λ σ → TM1.Stmt (Γ' K Γ) (Λ' K Γ Λ σ) σ
| TM2.Stmt.push k f q => goto fun _ _ ↦ go k (StAct.push f) q
| TM2.Stmt.peek k f q => goto fun _ _ ↦ go k (StAct.peek f) q
| TM2.Stmt.pop k f q => goto fun _ _ ↦ go k (StAct.pop f) q
| TM2.Stmt.load a q => load (fun _ ↦ a) (trNormal q)
| TM2.Stmt.branch f q₁ q₂ => branch (fun _ ↦ f) (trNormal q₁) (trNormal q₂)
| TM2.Stmt.goto l => goto fun _ s ↦ normal (l s)
| TM2.Stmt.halt => halt
theorem trNormal_run {k : K} (s : StAct K Γ σ k) (q : TM2.Stmt Γ Λ σ) :
trNormal (stRun s q) = goto fun _ _ ↦ go k s q := by
cases s <;> rfl
section
open scoped Classical in
/-- The set of machine states accessible from an initial TM2 statement. -/
noncomputable def trStmts₁ : TM2.Stmt Γ Λ σ → Finset (Λ' K Γ Λ σ)
| TM2.Stmt.push k f q => {go k (StAct.push f) q, ret q} ∪ trStmts₁ q
| TM2.Stmt.peek k f q => {go k (StAct.peek f) q, ret q} ∪ trStmts₁ q
| TM2.Stmt.pop k f q => {go k (StAct.pop f) q, ret q} ∪ trStmts₁ q
| TM2.Stmt.load _ q => trStmts₁ q
| TM2.Stmt.branch _ q₁ q₂ => trStmts₁ q₁ ∪ trStmts₁ q₂
| _ => ∅
theorem trStmts₁_run {k : K} {s : StAct K Γ σ k} {q : TM2.Stmt Γ Λ σ} :
open scoped Classical in
trStmts₁ (stRun s q) = {go k s q, ret q} ∪ trStmts₁ q := by
cases s <;> simp only [trStmts₁, stRun]
theorem tr_respects_aux₂ [DecidableEq K] {k : K} {q : TM1.Stmt (Γ' K Γ) (Λ' K Γ Λ σ) σ} {v : σ}
{S : ∀ k, List (Γ k)} {L : ListBlank (∀ k, Option (Γ k))}
(hL : ∀ k, L.map (proj k) = ListBlank.mk ((S k).map some).reverse) (o : StAct K Γ σ k) :
let v' := stVar v (S k) o
let Sk' := stWrite v (S k) o
let S' := update S k Sk'
∃ L' : ListBlank (∀ k, Option (Γ k)),
(∀ k, L'.map (proj k) = ListBlank.mk ((S' k).map some).reverse) ∧
TM1.stepAux (trStAct q o) v
((Tape.move Dir.right)^[(S k).length] (Tape.mk' ∅ (addBottom L))) =
TM1.stepAux q v' ((Tape.move Dir.right)^[(S' k).length] (Tape.mk' ∅ (addBottom L'))) := by
simp only [Function.update_self]; cases o with simp only [stWrite, stVar, trStAct, TM1.stepAux]
| push f =>
have := Tape.write_move_right_n fun a : Γ' K Γ ↦ (a.1, update a.2 k (some (f v)))
refine
⟨_, fun k' ↦ ?_, by
-- Porting note: `rw [...]` to `erw [...]; rfl`.
-- https://github.com/leanprover-community/mathlib4/issues/5164
rw [Tape.move_right_n_head, List.length, Tape.mk'_nth_nat, this]
erw [addBottom_modifyNth fun a ↦ update a k (some (f v))]
rw [Nat.add_one, iterate_succ']
rfl⟩
refine ListBlank.ext fun i ↦ ?_
rw [ListBlank.nth_map, ListBlank.nth_modifyNth, proj, PointedMap.mk_val]
by_cases h' : k' = k
· subst k'
split_ifs with h
<;> simp only [List.reverse_cons, Function.update_self, ListBlank.nth_mk, List.map]
· rw [List.getI_eq_getElem _, List.getElem_append_right] <;>
simp only [List.length_append, List.length_reverse, List.length_map, ← h,
Nat.sub_self, List.length_singleton, List.getElem_singleton,
le_refl, Nat.lt_succ_self]
rw [← proj_map_nth, hL, ListBlank.nth_mk]
rcases lt_or_gt_of_ne h with h | h
· rw [List.getI_append]
simpa only [List.length_map, List.length_reverse] using h
· rw [gt_iff_lt] at h
rw [List.getI_eq_default, List.getI_eq_default] <;>
simp only [Nat.add_one_le_iff, h, List.length, le_of_lt, List.length_reverse,
List.length_append, List.length_map]
· split_ifs <;> rw [Function.update_of_ne h', ← proj_map_nth, hL]
rw [Function.update_of_ne h']
| peek f =>
rw [Function.update_eq_self]
use L, hL; rw [Tape.move_left_right]; congr
cases e : S k; · rfl
rw [List.length_cons, iterate_succ', Function.comp, Tape.move_right_left,
Tape.move_right_n_head, Tape.mk'_nth_nat, addBottom_nth_snd, stk_nth_val _ (hL k), e,
List.reverse_cons, ← List.length_reverse, List.getElem?_concat_length]
rfl
| pop f =>
rcases e : S k with - | ⟨hd, tl⟩
· simp only [Tape.mk'_head, ListBlank.head_cons, Tape.move_left_mk', List.length,
Tape.write_mk', List.head?, iterate_zero_apply, List.tail_nil]
rw [← e, Function.update_eq_self]
exact ⟨L, hL, by rw [addBottom_head_fst, cond]⟩
· refine
⟨_, fun k' ↦ ?_, by
erw [List.length_cons, Tape.move_right_n_head, Tape.mk'_nth_nat, addBottom_nth_succ_fst,
cond_false, iterate_succ', Function.comp, Tape.move_right_left, Tape.move_right_n_head,
Tape.mk'_nth_nat, Tape.write_move_right_n fun a : Γ' K Γ ↦ (a.1, update a.2 k none),
addBottom_modifyNth fun a ↦ update a k none, addBottom_nth_snd,
stk_nth_val _ (hL k), e,
show (List.cons hd tl).reverse[tl.length]? = some hd by
rw [List.reverse_cons, ← List.length_reverse, List.getElem?_concat_length],
List.head?, List.tail]⟩
refine ListBlank.ext fun i ↦ ?_
rw [ListBlank.nth_map, ListBlank.nth_modifyNth, proj, PointedMap.mk_val]
by_cases h' : k' = k
· subst k'
split_ifs with h <;> simp only [Function.update_self, ListBlank.nth_mk, List.tail]
· rw [List.getI_eq_default]
· rfl
rw [h, List.length_reverse, List.length_map]
rw [← proj_map_nth, hL, ListBlank.nth_mk, e, List.map, List.reverse_cons]
rcases lt_or_gt_of_ne h with h | h
· rw [List.getI_append]
simpa only [List.length_map, List.length_reverse] using h
· rw [gt_iff_lt] at h
rw [List.getI_eq_default, List.getI_eq_default] <;>
simp only [Nat.add_one_le_iff, h, List.length, le_of_lt, List.length_reverse,
List.length_append, List.length_map]
· split_ifs <;> rw [Function.update_of_ne h', ← proj_map_nth, hL]
rw [Function.update_of_ne h']
end
variable [DecidableEq K]
variable (M : Λ → TM2.Stmt Γ Λ σ)
/-- The TM2 emulator machine states written as a TM1 program.
This handles the `go` and `ret` states, which shuttle to and from a stack top. -/
def tr : Λ' K Γ Λ σ → TM1.Stmt (Γ' K Γ) (Λ' K Γ Λ σ) σ
| normal q => trNormal (M q)
| go k s q =>
branch (fun a _ ↦ (a.2 k).isNone) (trStAct (goto fun _ _ ↦ ret q) s)
(move Dir.right <| goto fun _ _ ↦ go k s q)
| ret q => branch (fun a _ ↦ a.1) (trNormal q) (move Dir.left <| goto fun _ _ ↦ ret q)
/-- The relation between TM2 configurations and TM1 configurations of the TM2 emulator. -/
inductive TrCfg : TM2.Cfg Γ Λ σ → TM1.Cfg (Γ' K Γ) (Λ' K Γ Λ σ) σ → Prop
| mk {q : Option Λ} {v : σ} {S : ∀ k, List (Γ k)} (L : ListBlank (∀ k, Option (Γ k))) :
(∀ k, L.map (proj k) = ListBlank.mk ((S k).map some).reverse) →
TrCfg ⟨q, v, S⟩ ⟨q.map normal, v, Tape.mk' ∅ (addBottom L)⟩
theorem tr_respects_aux₁ {k} (o q v) {S : List (Γ k)} {L : ListBlank (∀ k, Option (Γ k))}
(hL : L.map (proj k) = ListBlank.mk (S.map some).reverse) (n) (H : n ≤ S.length) :
Reaches₀ (TM1.step (tr M)) ⟨some (go k o q), v, Tape.mk' ∅ (addBottom L)⟩
⟨some (go k o q), v, (Tape.move Dir.right)^[n] (Tape.mk' ∅ (addBottom L))⟩ := by
induction' n with n IH; · rfl
apply (IH (le_of_lt H)).tail
rw [iterate_succ_apply']
simp only [TM1.step, TM1.stepAux, tr, Tape.mk'_nth_nat, Tape.move_right_n_head,
addBottom_nth_snd, Option.mem_def]
rw [stk_nth_val _ hL, List.getElem?_eq_getElem]
· rfl
· rwa [List.length_reverse]
theorem tr_respects_aux₃ {q v} {L : ListBlank (∀ k, Option (Γ k))} (n) : Reaches₀ (TM1.step (tr M))
⟨some (ret q), v, (Tape.move Dir.right)^[n] (Tape.mk' ∅ (addBottom L))⟩
⟨some (ret q), v, Tape.mk' ∅ (addBottom L)⟩ := by
induction' n with n IH; · rfl
refine Reaches₀.head ?_ IH
simp only [Option.mem_def, TM1.step]
rw [Option.some_inj, tr, TM1.stepAux, Tape.move_right_n_head, Tape.mk'_nth_nat,
addBottom_nth_succ_fst, TM1.stepAux, iterate_succ', Function.comp_apply, Tape.move_right_left]
rfl
theorem tr_respects_aux {q v T k} {S : ∀ k, List (Γ k)}
(hT : ∀ k, ListBlank.map (proj k) T = ListBlank.mk ((S k).map some).reverse)
(o : StAct K Γ σ k)
(IH : ∀ {v : σ} {S : ∀ k : K, List (Γ k)} {T : ListBlank (∀ k, Option (Γ k))},
(∀ k, ListBlank.map (proj k) T = ListBlank.mk ((S k).map some).reverse) →
∃ b, TrCfg (TM2.stepAux q v S) b ∧
Reaches (TM1.step (tr M)) (TM1.stepAux (trNormal q) v (Tape.mk' ∅ (addBottom T))) b) :
∃ b, TrCfg (TM2.stepAux (stRun o q) v S) b ∧ Reaches (TM1.step (tr M))
(TM1.stepAux (trNormal (stRun o q)) v (Tape.mk' ∅ (addBottom T))) b := by
simp only [trNormal_run, step_run]
have hgo := tr_respects_aux₁ M o q v (hT k) _ le_rfl
obtain ⟨T', hT', hrun⟩ := tr_respects_aux₂ (Λ := Λ) hT o
have := hgo.tail' rfl
rw [tr, TM1.stepAux, Tape.move_right_n_head, Tape.mk'_nth_nat, addBottom_nth_snd,
stk_nth_val _ (hT k), List.getElem?_eq_none (le_of_eq List.length_reverse),
Option.isNone, cond, hrun, TM1.stepAux] at this
obtain ⟨c, gc, rc⟩ := IH hT'
refine ⟨c, gc, (this.to₀.trans (tr_respects_aux₃ M _) c (TransGen.head' rfl ?_)).to_reflTransGen⟩
rw [tr, TM1.stepAux, Tape.mk'_head, addBottom_head_fst]
exact rc
attribute [local simp] Respects TM2.step TM2.stepAux trNormal
theorem tr_respects : Respects (TM2.step M) (TM1.step (tr M)) TrCfg := by
-- Porting note (https://github.com/leanprover-community/mathlib4/issues/12129): additional beta reduction needed
intro c₁ c₂ h
obtain @⟨- | l, v, S, L, hT⟩ := h; · constructor
rsuffices ⟨b, c, r⟩ : ∃ b, _ ∧ Reaches (TM1.step (tr M)) _ _
· exact ⟨b, c, TransGen.head' rfl r⟩
simp only [tr]
generalize M l = N
induction N using stmtStRec generalizing v S L hT with
| run k s q IH => exact tr_respects_aux M hT s @IH
| load a _ IH => exact IH _ hT
| branch p q₁ q₂ IH₁ IH₂ =>
unfold TM2.stepAux trNormal TM1.stepAux
beta_reduce
cases p v <;> [exact IH₂ _ hT; exact IH₁ _ hT]
| goto => exact ⟨_, ⟨_, hT⟩, ReflTransGen.refl⟩
| halt => exact ⟨_, ⟨_, hT⟩, ReflTransGen.refl⟩
section
variable [Inhabited Λ] [Inhabited σ]
theorem trCfg_init (k) (L : List (Γ k)) : TrCfg (TM2.init k L)
(TM1.init (trInit k L) : TM1.Cfg (Γ' K Γ) (Λ' K Γ Λ σ) σ) := by
rw [(_ : TM1.init _ = _)]
· refine ⟨ListBlank.mk (L.reverse.map fun a ↦ update default k (some a)), fun k' ↦ ?_⟩
refine ListBlank.ext fun i ↦ ?_
rw [ListBlank.map_mk, ListBlank.nth_mk, List.getI_eq_iget_getElem?, List.map_map]
have : ((proj k').f ∘ fun a => update (β := fun k => Option (Γ k)) default k (some a))
= fun a => (proj k').f (update (β := fun k => Option (Γ k)) default k (some a)) := rfl
rw [this, List.getElem?_map, proj, PointedMap.mk_val]
simp only []
by_cases h : k' = k
· subst k'
simp only [Function.update_self]
rw [ListBlank.nth_mk, List.getI_eq_iget_getElem?, ← List.map_reverse, List.getElem?_map]
· simp only [Function.update_of_ne h]
rw [ListBlank.nth_mk, List.getI_eq_iget_getElem?, List.map, List.reverse_nil]
cases L.reverse[i]? <;> rfl
· rw [trInit, TM1.init]
congr <;> cases L.reverse <;> try rfl
simp only [List.map_map, List.tail_cons, List.map]
rfl
theorem tr_eval_dom (k) (L : List (Γ k)) :
(TM1.eval (tr M) (trInit k L)).Dom ↔ (TM2.eval M k L).Dom :=
Turing.tr_eval_dom (tr_respects M) (trCfg_init k L)
theorem tr_eval (k) (L : List (Γ k)) {L₁ L₂} (H₁ : L₁ ∈ TM1.eval (tr M) (trInit k L))
(H₂ : L₂ ∈ TM2.eval M k L) :
∃ (S : ∀ k, List (Γ k)) (L' : ListBlank (∀ k, Option (Γ k))),
addBottom L' = L₁ ∧
(∀ k, L'.map (proj k) = ListBlank.mk ((S k).map some).reverse) ∧ S k = L₂ := by
obtain ⟨c₁, h₁, rfl⟩ := (Part.mem_map_iff _).1 H₁
obtain ⟨c₂, h₂, rfl⟩ := (Part.mem_map_iff _).1 H₂
obtain ⟨_, ⟨L', hT⟩, h₃⟩ := Turing.tr_eval (tr_respects M) (trCfg_init k L) h₂
cases Part.mem_unique h₁ h₃
exact ⟨_, L', by simp only [Tape.mk'_right₀], hT, rfl⟩
end
section
variable [Inhabited Λ]
open scoped Classical in
/-- The support of a set of TM2 states in the TM2 emulator. -/
noncomputable def trSupp (S : Finset Λ) : Finset (Λ' K Γ Λ σ) :=
S.biUnion fun l ↦ insert (normal l) (trStmts₁ (M l))
open scoped Classical in
theorem tr_supports {S} (ss : TM2.Supports M S) : TM1.Supports (tr M) (trSupp M S) :=
⟨Finset.mem_biUnion.2 ⟨_, ss.1, Finset.mem_insert.2 <| Or.inl rfl⟩, fun l' h ↦ by
suffices ∀ (q) (_ : TM2.SupportsStmt S q) (_ : ∀ x ∈ trStmts₁ q, x ∈ trSupp M S),
TM1.SupportsStmt (trSupp M S) (trNormal q) ∧
∀ l' ∈ trStmts₁ q, TM1.SupportsStmt (trSupp M S) (tr M l') by
rcases Finset.mem_biUnion.1 h with ⟨l, lS, h⟩
have :=
this _ (ss.2 l lS) fun x hx ↦ Finset.mem_biUnion.2 ⟨_, lS, Finset.mem_insert_of_mem hx⟩
rcases Finset.mem_insert.1 h with (rfl | h) <;> [exact this.1; exact this.2 _ h]
clear h l'
refine stmtStRec ?_ ?_ ?_ ?_ ?_
· intro _ s _ IH ss' sub -- stack op
rw [TM2to1.supports_run] at ss'
simp only [TM2to1.trStmts₁_run, Finset.mem_union, Finset.mem_insert, Finset.mem_singleton]
at sub
have hgo := sub _ (Or.inl <| Or.inl rfl)
have hret := sub _ (Or.inl <| Or.inr rfl)
obtain ⟨IH₁, IH₂⟩ := IH ss' fun x hx ↦ sub x <| Or.inr hx
refine ⟨by simp only [trNormal_run, TM1.SupportsStmt]; intros; exact hgo, fun l h ↦ ?_⟩
rw [trStmts₁_run] at h
simp only [TM2to1.trStmts₁_run, Finset.mem_union, Finset.mem_insert, Finset.mem_singleton]
at h
rcases h with (⟨rfl | rfl⟩ | h)
· cases s
· exact ⟨fun _ _ ↦ hret, fun _ _ ↦ hgo⟩
· exact ⟨fun _ _ ↦ hret, fun _ _ ↦ hgo⟩
· exact ⟨⟨fun _ _ ↦ hret, fun _ _ ↦ hret⟩, fun _ _ ↦ hgo⟩
· unfold TM1.SupportsStmt TM2to1.tr
exact ⟨IH₁, fun _ _ ↦ hret⟩
· exact IH₂ _ h
· intro _ _ IH ss' sub -- load
unfold TM2to1.trStmts₁ at sub ⊢
exact IH ss' sub
· intro _ _ _ IH₁ IH₂ ss' sub -- branch
unfold TM2to1.trStmts₁ at sub
obtain ⟨IH₁₁, IH₁₂⟩ := IH₁ ss'.1 fun x hx ↦ sub x <| Finset.mem_union_left _ hx
obtain ⟨IH₂₁, IH₂₂⟩ := IH₂ ss'.2 fun x hx ↦ sub x <| Finset.mem_union_right _ hx
refine ⟨⟨IH₁₁, IH₂₁⟩, fun l h ↦ ?_⟩
rw [trStmts₁] at h
rcases Finset.mem_union.1 h with (h | h) <;> [exact IH₁₂ _ h; exact IH₂₂ _ h]
· intro _ ss' _ -- goto
simp only [trStmts₁, Finset.not_mem_empty]; refine ⟨?_, fun _ ↦ False.elim⟩
exact fun _ v ↦ Finset.mem_biUnion.2 ⟨_, ss' v, Finset.mem_insert_self _ _⟩
· intro _ _ -- halt
simp only [trStmts₁, Finset.not_mem_empty]
exact ⟨trivial, fun _ ↦ False.elim⟩⟩
end
end TM2to1
end Turing
| Mathlib/Computability/TuringMachine.lean | 1,713 | 1,716 | |
/-
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 :
| Mathlib/LinearAlgebra/Matrix/ToLin.lean | 419 | 424 |
/-
Copyright (c) 2017 Johannes Hölzl. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johannes Hölzl, Mario Carneiro, Patrick Massot
-/
import Mathlib.Algebra.Group.TypeTags.Basic
import Mathlib.Data.Fin.VecNotation
import Mathlib.Data.Finset.Piecewise
import Mathlib.Order.Filter.Cofinite
import Mathlib.Order.Filter.Curry
import Mathlib.Topology.Constructions.SumProd
import Mathlib.Topology.NhdsSet
/-!
# Constructions of new topological spaces from old ones
This file constructs pi types, subtypes and quotients of topological spaces
and sets up their basic theory, such as criteria for maps into or out of these
constructions to be continuous; descriptions of the open sets, neighborhood filters,
and generators of these constructions; and their behavior with respect to embeddings
and other specific classes of maps.
## Implementation note
The constructed topologies are defined using induced and coinduced topologies
along with the complete lattice structure on topologies. Their universal properties
(for example, a map `X → Y × Z` is continuous if and only if both projections
`X → Y`, `X → Z` are) follow easily using order-theoretic descriptions of
continuity. With more work we can also extract descriptions of the open sets,
neighborhood filters and so on.
## Tags
product, subspace, quotient space
-/
noncomputable section
open Topology TopologicalSpace Set Filter Function
open scoped Set.Notation
universe u v u' v'
variable {X : Type u} {Y : Type v} {Z W ε ζ : Type*}
section Constructions
instance {r : X → X → Prop} [t : TopologicalSpace X] : TopologicalSpace (Quot r) :=
coinduced (Quot.mk r) t
instance instTopologicalSpaceQuotient {s : Setoid X} [t : TopologicalSpace X] :
TopologicalSpace (Quotient s) :=
coinduced Quotient.mk' t
instance instTopologicalSpaceSigma {ι : Type*} {X : ι → Type v} [t₂ : ∀ i, TopologicalSpace (X i)] :
TopologicalSpace (Sigma X) :=
⨆ i, coinduced (Sigma.mk i) (t₂ i)
instance Pi.topologicalSpace {ι : Type*} {Y : ι → Type v} [t₂ : (i : ι) → TopologicalSpace (Y i)] :
TopologicalSpace ((i : ι) → Y i) :=
⨅ i, induced (fun f => f i) (t₂ i)
instance ULift.topologicalSpace [t : TopologicalSpace X] : TopologicalSpace (ULift.{v, u} X) :=
t.induced ULift.down
/-!
### `Additive`, `Multiplicative`
The topology on those type synonyms is inherited without change.
-/
section
variable [TopologicalSpace X]
open Additive Multiplicative
instance : TopologicalSpace (Additive X) := ‹TopologicalSpace X›
instance : TopologicalSpace (Multiplicative X) := ‹TopologicalSpace X›
instance [DiscreteTopology X] : DiscreteTopology (Additive X) := ‹DiscreteTopology X›
instance [DiscreteTopology X] : DiscreteTopology (Multiplicative X) := ‹DiscreteTopology X›
theorem continuous_ofMul : Continuous (ofMul : X → Additive X) := continuous_id
theorem continuous_toMul : Continuous (toMul : Additive X → X) := continuous_id
theorem continuous_ofAdd : Continuous (ofAdd : X → Multiplicative X) := continuous_id
theorem continuous_toAdd : Continuous (toAdd : Multiplicative X → X) := continuous_id
theorem isOpenMap_ofMul : IsOpenMap (ofMul : X → Additive X) := IsOpenMap.id
theorem isOpenMap_toMul : IsOpenMap (toMul : Additive X → X) := IsOpenMap.id
theorem isOpenMap_ofAdd : IsOpenMap (ofAdd : X → Multiplicative X) := IsOpenMap.id
theorem isOpenMap_toAdd : IsOpenMap (toAdd : Multiplicative X → X) := IsOpenMap.id
theorem isClosedMap_ofMul : IsClosedMap (ofMul : X → Additive X) := IsClosedMap.id
theorem isClosedMap_toMul : IsClosedMap (toMul : Additive X → X) := IsClosedMap.id
theorem isClosedMap_ofAdd : IsClosedMap (ofAdd : X → Multiplicative X) := IsClosedMap.id
theorem isClosedMap_toAdd : IsClosedMap (toAdd : Multiplicative X → X) := IsClosedMap.id
theorem nhds_ofMul (x : X) : 𝓝 (ofMul x) = map ofMul (𝓝 x) := rfl
theorem nhds_ofAdd (x : X) : 𝓝 (ofAdd x) = map ofAdd (𝓝 x) := rfl
theorem nhds_toMul (x : Additive X) : 𝓝 x.toMul = map toMul (𝓝 x) := rfl
theorem nhds_toAdd (x : Multiplicative X) : 𝓝 x.toAdd = map toAdd (𝓝 x) := rfl
end
/-!
### Order dual
The topology on this type synonym is inherited without change.
-/
section
variable [TopologicalSpace X]
open OrderDual
instance OrderDual.instTopologicalSpace : TopologicalSpace Xᵒᵈ := ‹_›
instance OrderDual.instDiscreteTopology [DiscreteTopology X] : DiscreteTopology Xᵒᵈ := ‹_›
theorem continuous_toDual : Continuous (toDual : X → Xᵒᵈ) := continuous_id
theorem continuous_ofDual : Continuous (ofDual : Xᵒᵈ → X) := continuous_id
theorem isOpenMap_toDual : IsOpenMap (toDual : X → Xᵒᵈ) := IsOpenMap.id
theorem isOpenMap_ofDual : IsOpenMap (ofDual : Xᵒᵈ → X) := IsOpenMap.id
theorem isClosedMap_toDual : IsClosedMap (toDual : X → Xᵒᵈ) := IsClosedMap.id
theorem isClosedMap_ofDual : IsClosedMap (ofDual : Xᵒᵈ → X) := IsClosedMap.id
theorem nhds_toDual (x : X) : 𝓝 (toDual x) = map toDual (𝓝 x) := rfl
theorem nhds_ofDual (x : X) : 𝓝 (ofDual x) = map ofDual (𝓝 x) := rfl
variable [Preorder X] {x : X}
instance OrderDual.instNeBotNhdsWithinIoi [(𝓝[<] x).NeBot] : (𝓝[>] toDual x).NeBot := ‹_›
instance OrderDual.instNeBotNhdsWithinIio [(𝓝[>] x).NeBot] : (𝓝[<] toDual x).NeBot := ‹_›
end
theorem Quotient.preimage_mem_nhds [TopologicalSpace X] [s : Setoid X] {V : Set <| Quotient s}
{x : X} (hs : V ∈ 𝓝 (Quotient.mk' x)) : Quotient.mk' ⁻¹' V ∈ 𝓝 x :=
preimage_nhds_coinduced hs
/-- The image of a dense set under `Quotient.mk'` is a dense set. -/
theorem Dense.quotient [Setoid X] [TopologicalSpace X] {s : Set X} (H : Dense s) :
Dense (Quotient.mk' '' s) :=
Quotient.mk''_surjective.denseRange.dense_image continuous_coinduced_rng H
/-- The composition of `Quotient.mk'` and a function with dense range has dense range. -/
theorem DenseRange.quotient [Setoid X] [TopologicalSpace X] {f : Y → X} (hf : DenseRange f) :
DenseRange (Quotient.mk' ∘ f) :=
Quotient.mk''_surjective.denseRange.comp hf continuous_coinduced_rng
theorem continuous_map_of_le {α : Type*} [TopologicalSpace α]
{s t : Setoid α} (h : s ≤ t) : Continuous (Setoid.map_of_le h) :=
continuous_coinduced_rng
theorem continuous_map_sInf {α : Type*} [TopologicalSpace α]
{S : Set (Setoid α)} {s : Setoid α} (h : s ∈ S) : Continuous (Setoid.map_sInf h) :=
continuous_coinduced_rng
instance {p : X → Prop} [TopologicalSpace X] [DiscreteTopology X] : DiscreteTopology (Subtype p) :=
⟨bot_unique fun s _ => ⟨(↑) '' s, isOpen_discrete _, preimage_image_eq _ Subtype.val_injective⟩⟩
instance Sum.discreteTopology [TopologicalSpace X] [TopologicalSpace Y] [h : DiscreteTopology X]
[hY : DiscreteTopology Y] : DiscreteTopology (X ⊕ Y) :=
⟨sup_eq_bot_iff.2 <| by simp [h.eq_bot, hY.eq_bot]⟩
instance Sigma.discreteTopology {ι : Type*} {Y : ι → Type v} [∀ i, TopologicalSpace (Y i)]
[h : ∀ i, DiscreteTopology (Y i)] : DiscreteTopology (Sigma Y) :=
⟨iSup_eq_bot.2 fun _ => by simp only [(h _).eq_bot, coinduced_bot]⟩
@[simp] lemma comap_nhdsWithin_range {α β} [TopologicalSpace β] (f : α → β) (y : β) :
comap f (𝓝[range f] y) = comap f (𝓝 y) := comap_inf_principal_range
section Top
variable [TopologicalSpace X]
/-
The 𝓝 filter and the subspace topology.
-/
theorem mem_nhds_subtype (s : Set X) (x : { x // x ∈ s }) (t : Set { x // x ∈ s }) :
t ∈ 𝓝 x ↔ ∃ u ∈ 𝓝 (x : X), Subtype.val ⁻¹' u ⊆ t :=
mem_nhds_induced _ x t
theorem nhds_subtype (s : Set X) (x : { x // x ∈ s }) : 𝓝 x = comap (↑) (𝓝 (x : X)) :=
nhds_induced _ x
lemma nhds_subtype_eq_comap_nhdsWithin (s : Set X) (x : { x // x ∈ s }) :
𝓝 x = comap (↑) (𝓝[s] (x : X)) := by
rw [nhds_subtype, ← comap_nhdsWithin_range, Subtype.range_val]
theorem nhdsWithin_subtype_eq_bot_iff {s t : Set X} {x : s} :
𝓝[((↑) : s → X) ⁻¹' t] x = ⊥ ↔ 𝓝[t] (x : X) ⊓ 𝓟 s = ⊥ := by
rw [inf_principal_eq_bot_iff_comap, nhdsWithin, nhdsWithin, comap_inf, comap_principal,
nhds_induced]
theorem nhds_ne_subtype_eq_bot_iff {S : Set X} {x : S} :
𝓝[≠] x = ⊥ ↔ 𝓝[≠] (x : X) ⊓ 𝓟 S = ⊥ := by
rw [← nhdsWithin_subtype_eq_bot_iff, preimage_compl, ← image_singleton,
Subtype.coe_injective.preimage_image]
theorem nhds_ne_subtype_neBot_iff {S : Set X} {x : S} :
(𝓝[≠] x).NeBot ↔ (𝓝[≠] (x : X) ⊓ 𝓟 S).NeBot := by
rw [neBot_iff, neBot_iff, not_iff_not, nhds_ne_subtype_eq_bot_iff]
theorem discreteTopology_subtype_iff {S : Set X} :
DiscreteTopology S ↔ ∀ x ∈ S, 𝓝[≠] x ⊓ 𝓟 S = ⊥ := by
simp_rw [discreteTopology_iff_nhds_ne, SetCoe.forall', nhds_ne_subtype_eq_bot_iff]
end Top
/-- A type synonym equipped with the topology whose open sets are the empty set and the sets with
finite complements. -/
def CofiniteTopology (X : Type*) := X
namespace CofiniteTopology
/-- The identity equivalence between `` and `CofiniteTopology `. -/
def of : X ≃ CofiniteTopology X :=
Equiv.refl X
instance [Inhabited X] : Inhabited (CofiniteTopology X) where default := of default
instance : TopologicalSpace (CofiniteTopology X) where
IsOpen s := s.Nonempty → Set.Finite sᶜ
isOpen_univ := by simp
isOpen_inter s t := by
rintro hs ht ⟨x, hxs, hxt⟩
rw [compl_inter]
exact (hs ⟨x, hxs⟩).union (ht ⟨x, hxt⟩)
isOpen_sUnion := by
rintro s h ⟨x, t, hts, hzt⟩
rw [compl_sUnion]
exact Finite.sInter (mem_image_of_mem _ hts) (h t hts ⟨x, hzt⟩)
theorem isOpen_iff {s : Set (CofiniteTopology X)} : IsOpen s ↔ s.Nonempty → sᶜ.Finite :=
Iff.rfl
theorem isOpen_iff' {s : Set (CofiniteTopology X)} : IsOpen s ↔ s = ∅ ∨ sᶜ.Finite := by
simp only [isOpen_iff, nonempty_iff_ne_empty, or_iff_not_imp_left]
theorem isClosed_iff {s : Set (CofiniteTopology X)} : IsClosed s ↔ s = univ ∨ s.Finite := by
simp only [← isOpen_compl_iff, isOpen_iff', compl_compl, compl_empty_iff]
theorem nhds_eq (x : CofiniteTopology X) : 𝓝 x = pure x ⊔ cofinite := by
ext U
rw [mem_nhds_iff]
constructor
· rintro ⟨V, hVU, V_op, haV⟩
exact mem_sup.mpr ⟨hVU haV, mem_of_superset (V_op ⟨_, haV⟩) hVU⟩
· rintro ⟨hU : x ∈ U, hU' : Uᶜ.Finite⟩
exact ⟨U, Subset.rfl, fun _ => hU', hU⟩
theorem mem_nhds_iff {x : CofiniteTopology X} {s : Set (CofiniteTopology X)} :
s ∈ 𝓝 x ↔ x ∈ s ∧ sᶜ.Finite := by simp [nhds_eq]
end CofiniteTopology
end Constructions
section Prod
variable [TopologicalSpace X] [TopologicalSpace Y]
theorem MapClusterPt.curry_prodMap {α β : Type*}
{f : α → X} {g : β → Y} {la : Filter α} {lb : Filter β} {x : X} {y : Y}
(hf : MapClusterPt x la f) (hg : MapClusterPt y lb g) :
MapClusterPt (x, y) (la.curry lb) (.map f g) := by
rw [mapClusterPt_iff_frequently] at hf hg
rw [((𝓝 x).basis_sets.prod_nhds (𝓝 y).basis_sets).mapClusterPt_iff_frequently]
rintro ⟨s, t⟩ ⟨hs, ht⟩
rw [frequently_curry_iff]
exact (hf s hs).mono fun x hx ↦ (hg t ht).mono fun y hy ↦ ⟨hx, hy⟩
theorem MapClusterPt.prodMap {α β : Type*}
{f : α → X} {g : β → Y} {la : Filter α} {lb : Filter β} {x : X} {y : Y}
(hf : MapClusterPt x la f) (hg : MapClusterPt y lb g) :
MapClusterPt (x, y) (la ×ˢ lb) (.map f g) :=
(hf.curry_prodMap hg).mono <| map_mono curry_le_prod
end Prod
section Bool
lemma continuous_bool_rng [TopologicalSpace X] {f : X → Bool} (b : Bool) :
Continuous f ↔ IsClopen (f ⁻¹' {b}) := by
rw [continuous_discrete_rng, Bool.forall_bool' b, IsClopen, ← isOpen_compl_iff, ← preimage_compl,
Bool.compl_singleton, and_comm]
end Bool
section Subtype
variable [TopologicalSpace X] [TopologicalSpace Y] {p : X → Prop}
lemma Topology.IsInducing.subtypeVal {t : Set Y} : IsInducing ((↑) : t → Y) := ⟨rfl⟩
@[deprecated (since := "2024-10-28")] alias inducing_subtype_val := IsInducing.subtypeVal
lemma Topology.IsInducing.of_codRestrict {f : X → Y} {t : Set Y} (ht : ∀ x, f x ∈ t)
(h : IsInducing (t.codRestrict f ht)) : IsInducing f := subtypeVal.comp h
@[deprecated (since := "2024-10-28")] alias Inducing.of_codRestrict := IsInducing.of_codRestrict
lemma Topology.IsEmbedding.subtypeVal : IsEmbedding ((↑) : Subtype p → X) :=
⟨.subtypeVal, Subtype.coe_injective⟩
@[deprecated (since := "2024-10-26")] alias embedding_subtype_val := IsEmbedding.subtypeVal
theorem Topology.IsClosedEmbedding.subtypeVal (h : IsClosed {a | p a}) :
IsClosedEmbedding ((↑) : Subtype p → X) :=
⟨.subtypeVal, by rwa [Subtype.range_coe_subtype]⟩
@[continuity, fun_prop]
theorem continuous_subtype_val : Continuous (@Subtype.val X p) :=
continuous_induced_dom
theorem Continuous.subtype_val {f : Y → Subtype p} (hf : Continuous f) :
Continuous fun x => (f x : X) :=
continuous_subtype_val.comp hf
theorem IsOpen.isOpenEmbedding_subtypeVal {s : Set X} (hs : IsOpen s) :
IsOpenEmbedding ((↑) : s → X) :=
⟨.subtypeVal, (@Subtype.range_coe _ s).symm ▸ hs⟩
theorem IsOpen.isOpenMap_subtype_val {s : Set X} (hs : IsOpen s) : IsOpenMap ((↑) : s → X) :=
hs.isOpenEmbedding_subtypeVal.isOpenMap
theorem IsOpenMap.restrict {f : X → Y} (hf : IsOpenMap f) {s : Set X} (hs : IsOpen s) :
IsOpenMap (s.restrict f) :=
hf.comp hs.isOpenMap_subtype_val
lemma IsClosed.isClosedEmbedding_subtypeVal {s : Set X} (hs : IsClosed s) :
IsClosedEmbedding ((↑) : s → X) := .subtypeVal hs
theorem IsClosed.isClosedMap_subtype_val {s : Set X} (hs : IsClosed s) :
IsClosedMap ((↑) : s → X) :=
hs.isClosedEmbedding_subtypeVal.isClosedMap
@[continuity, fun_prop]
theorem Continuous.subtype_mk {f : Y → X} (h : Continuous f) (hp : ∀ x, p (f x)) :
Continuous fun x => (⟨f x, hp x⟩ : Subtype p) :=
continuous_induced_rng.2 h
theorem Continuous.subtype_map {f : X → Y} (h : Continuous f) {q : Y → Prop}
(hpq : ∀ x, p x → q (f x)) : Continuous (Subtype.map f hpq) :=
(h.comp continuous_subtype_val).subtype_mk _
theorem continuous_inclusion {s t : Set X} (h : s ⊆ t) : Continuous (inclusion h) :=
continuous_id.subtype_map h
theorem continuousAt_subtype_val {p : X → Prop} {x : Subtype p} :
ContinuousAt ((↑) : Subtype p → X) x :=
continuous_subtype_val.continuousAt
theorem Subtype.dense_iff {s : Set X} {t : Set s} : Dense t ↔ s ⊆ closure ((↑) '' t) := by
rw [IsInducing.subtypeVal.dense_iff, SetCoe.forall]
rfl
theorem map_nhds_subtype_val {s : Set X} (x : s) : map ((↑) : s → X) (𝓝 x) = 𝓝[s] ↑x := by
rw [IsInducing.subtypeVal.map_nhds_eq, Subtype.range_val]
theorem map_nhds_subtype_coe_eq_nhds {x : X} (hx : p x) (h : ∀ᶠ x in 𝓝 x, p x) :
map ((↑) : Subtype p → X) (𝓝 ⟨x, hx⟩) = 𝓝 x :=
map_nhds_induced_of_mem <| by rw [Subtype.range_val]; exact h
theorem nhds_subtype_eq_comap {x : X} {h : p x} : 𝓝 (⟨x, h⟩ : Subtype p) = comap (↑) (𝓝 x) :=
nhds_induced _ _
theorem tendsto_subtype_rng {Y : Type*} {p : X → Prop} {l : Filter Y} {f : Y → Subtype p} :
∀ {x : Subtype p}, Tendsto f l (𝓝 x) ↔ Tendsto (fun x => (f x : X)) l (𝓝 (x : X))
| ⟨a, ha⟩ => by rw [nhds_subtype_eq_comap, tendsto_comap_iff]; rfl
theorem closure_subtype {x : { a // p a }} {s : Set { a // p a }} :
x ∈ closure s ↔ (x : X) ∈ closure (((↑) : _ → X) '' s) :=
closure_induced
@[simp]
theorem continuousAt_codRestrict_iff {f : X → Y} {t : Set Y} (h1 : ∀ x, f x ∈ t) {x : X} :
ContinuousAt (codRestrict f t h1) x ↔ ContinuousAt f x :=
IsInducing.subtypeVal.continuousAt_iff
alias ⟨_, ContinuousAt.codRestrict⟩ := continuousAt_codRestrict_iff
theorem ContinuousAt.restrict {f : X → Y} {s : Set X} {t : Set Y} (h1 : MapsTo f s t) {x : s}
(h2 : ContinuousAt f x) : ContinuousAt (h1.restrict f s t) x :=
(h2.comp continuousAt_subtype_val).codRestrict _
theorem ContinuousAt.restrictPreimage {f : X → Y} {s : Set Y} {x : f ⁻¹' s} (h : ContinuousAt f x) :
ContinuousAt (s.restrictPreimage f) x :=
h.restrict _
@[continuity, fun_prop]
theorem Continuous.codRestrict {f : X → Y} {s : Set Y} (hf : Continuous f) (hs : ∀ a, f a ∈ s) :
Continuous (s.codRestrict f hs) :=
hf.subtype_mk hs
@[continuity, fun_prop]
theorem Continuous.restrict {f : X → Y} {s : Set X} {t : Set Y} (h1 : MapsTo f s t)
(h2 : Continuous f) : Continuous (h1.restrict f s t) :=
(h2.comp continuous_subtype_val).codRestrict _
@[continuity, fun_prop]
theorem Continuous.restrictPreimage {f : X → Y} {s : Set Y} (h : Continuous f) :
Continuous (s.restrictPreimage f) :=
h.restrict _
lemma Topology.IsEmbedding.restrict {f : X → Y}
(hf : IsEmbedding f) {s : Set X} {t : Set Y} (H : s.MapsTo f t) :
IsEmbedding H.restrict :=
.of_comp (hf.continuous.restrict H) continuous_subtype_val (hf.comp .subtypeVal)
lemma Topology.IsOpenEmbedding.restrict {f : X → Y}
(hf : IsOpenEmbedding f) {s : Set X} {t : Set Y} (H : s.MapsTo f t) (hs : IsOpen s) :
IsOpenEmbedding H.restrict :=
⟨hf.isEmbedding.restrict H, (by
rw [MapsTo.range_restrict]
exact continuous_subtype_val.1 _ (hf.isOpenMap _ hs))⟩
theorem Topology.IsInducing.codRestrict {e : X → Y} (he : IsInducing e) {s : Set Y}
(hs : ∀ x, e x ∈ s) : IsInducing (codRestrict e s hs) :=
he.of_comp (he.continuous.codRestrict hs) continuous_subtype_val
@[deprecated (since := "2024-10-28")] alias Inducing.codRestrict := IsInducing.codRestrict
protected lemma Topology.IsEmbedding.codRestrict {e : X → Y} (he : IsEmbedding e) (s : Set Y)
(hs : ∀ x, e x ∈ s) : IsEmbedding (codRestrict e s hs) :=
he.of_comp (he.continuous.codRestrict hs) continuous_subtype_val
@[deprecated (since := "2024-10-26")]
alias Embedding.codRestrict := IsEmbedding.codRestrict
variable {s t : Set X}
protected lemma Topology.IsEmbedding.inclusion (h : s ⊆ t) :
IsEmbedding (inclusion h) := IsEmbedding.subtypeVal.codRestrict _ _
protected lemma Topology.IsOpenEmbedding.inclusion (hst : s ⊆ t) (hs : IsOpen (t ↓∩ s)) :
IsOpenEmbedding (inclusion hst) where
toIsEmbedding := .inclusion _
isOpen_range := by rwa [range_inclusion]
protected lemma Topology.IsClosedEmbedding.inclusion (hst : s ⊆ t) (hs : IsClosed (t ↓∩ s)) :
IsClosedEmbedding (inclusion hst) where
toIsEmbedding := .inclusion _
isClosed_range := by rwa [range_inclusion]
@[deprecated (since := "2024-10-26")]
alias embedding_inclusion := IsEmbedding.inclusion
/-- Let `s, t ⊆ X` be two subsets of a topological space `X`. If `t ⊆ s` and the topology induced
by `X`on `s` is discrete, then also the topology induces on `t` is discrete. -/
theorem DiscreteTopology.of_subset {X : Type*} [TopologicalSpace X] {s t : Set X}
(_ : DiscreteTopology s) (ts : t ⊆ s) : DiscreteTopology t :=
(IsEmbedding.inclusion ts).discreteTopology
/-- Let `s` be a discrete subset of a topological space. Then the preimage of `s` by
a continuous injective map is also discrete. -/
theorem DiscreteTopology.preimage_of_continuous_injective {X Y : Type*} [TopologicalSpace X]
[TopologicalSpace Y] (s : Set Y) [DiscreteTopology s] {f : X → Y} (hc : Continuous f)
(hinj : Function.Injective f) : DiscreteTopology (f ⁻¹' s) :=
DiscreteTopology.of_continuous_injective (β := s) (Continuous.restrict
(by exact fun _ x ↦ x) hc) ((MapsTo.restrict_inj _).mpr hinj.injOn)
/-- If `f : X → Y` is a quotient map,
then its restriction to the preimage of an open set is a quotient map too. -/
theorem Topology.IsQuotientMap.restrictPreimage_isOpen {f : X → Y} (hf : IsQuotientMap f)
{s : Set Y} (hs : IsOpen s) : IsQuotientMap (s.restrictPreimage f) := by
refine isQuotientMap_iff.2 ⟨hf.surjective.restrictPreimage _, fun U ↦ ?_⟩
rw [hs.isOpenEmbedding_subtypeVal.isOpen_iff_image_isOpen, ← hf.isOpen_preimage,
(hs.preimage hf.continuous).isOpenEmbedding_subtypeVal.isOpen_iff_image_isOpen,
image_val_preimage_restrictPreimage]
@[deprecated (since := "2024-10-22")]
alias QuotientMap.restrictPreimage_isOpen := IsQuotientMap.restrictPreimage_isOpen
open scoped Set.Notation in
lemma isClosed_preimage_val {s t : Set X} : IsClosed (s ↓∩ t) ↔ s ∩ closure (s ∩ t) ⊆ t := by
rw [← closure_eq_iff_isClosed, IsEmbedding.subtypeVal.closure_eq_preimage_closure_image,
← Subtype.val_injective.image_injective.eq_iff, Subtype.image_preimage_coe,
Subtype.image_preimage_coe, subset_antisymm_iff, and_iff_left, Set.subset_inter_iff,
and_iff_right]
exacts [Set.inter_subset_left, Set.subset_inter Set.inter_subset_left subset_closure]
theorem frontier_inter_open_inter {s t : Set X} (ht : IsOpen t) :
frontier (s ∩ t) ∩ t = frontier s ∩ t := by
simp only [Set.inter_comm _ t, ← Subtype.preimage_coe_eq_preimage_coe_iff,
ht.isOpenMap_subtype_val.preimage_frontier_eq_frontier_preimage continuous_subtype_val,
Subtype.preimage_coe_self_inter]
section SetNotation
open scoped Set.Notation
lemma IsOpen.preimage_val {s t : Set X} (ht : IsOpen t) : IsOpen (s ↓∩ t) :=
ht.preimage continuous_subtype_val
lemma IsClosed.preimage_val {s t : Set X} (ht : IsClosed t) : IsClosed (s ↓∩ t) :=
ht.preimage continuous_subtype_val
@[simp] lemma IsOpen.inter_preimage_val_iff {s t : Set X} (hs : IsOpen s) :
IsOpen (s ↓∩ t) ↔ IsOpen (s ∩ t) :=
⟨fun h ↦ by simpa using hs.isOpenMap_subtype_val _ h,
fun h ↦ (Subtype.preimage_coe_self_inter _ _).symm ▸ h.preimage_val⟩
@[simp] lemma IsClosed.inter_preimage_val_iff {s t : Set X} (hs : IsClosed s) :
IsClosed (s ↓∩ t) ↔ IsClosed (s ∩ t) :=
⟨fun h ↦ by simpa using hs.isClosedMap_subtype_val _ h,
fun h ↦ (Subtype.preimage_coe_self_inter _ _).symm ▸ h.preimage_val⟩
end SetNotation
end Subtype
section Quotient
variable [TopologicalSpace X] [TopologicalSpace Y]
variable {r : X → X → Prop} {s : Setoid X}
theorem isQuotientMap_quot_mk : IsQuotientMap (@Quot.mk X r) :=
⟨Quot.exists_rep, rfl⟩
@[deprecated (since := "2024-10-22")]
alias quotientMap_quot_mk := isQuotientMap_quot_mk
@[continuity, fun_prop]
theorem continuous_quot_mk : Continuous (@Quot.mk X r) :=
continuous_coinduced_rng
@[continuity, fun_prop]
theorem continuous_quot_lift {f : X → Y} (hr : ∀ a b, r a b → f a = f b) (h : Continuous f) :
Continuous (Quot.lift f hr : Quot r → Y) :=
continuous_coinduced_dom.2 h
theorem isQuotientMap_quotient_mk' : IsQuotientMap (@Quotient.mk' X s) :=
isQuotientMap_quot_mk
@[deprecated (since := "2024-10-22")]
alias quotientMap_quotient_mk' := isQuotientMap_quotient_mk'
theorem continuous_quotient_mk' : Continuous (@Quotient.mk' X s) :=
continuous_coinduced_rng
theorem Continuous.quotient_lift {f : X → Y} (h : Continuous f) (hs : ∀ a b, a ≈ b → f a = f b) :
Continuous (Quotient.lift f hs : Quotient s → Y) :=
continuous_coinduced_dom.2 h
theorem Continuous.quotient_liftOn' {f : X → Y} (h : Continuous f)
(hs : ∀ a b, s a b → f a = f b) :
Continuous (fun x => Quotient.liftOn' x f hs : Quotient s → Y) :=
h.quotient_lift hs
open scoped Relator in
@[continuity, fun_prop]
theorem Continuous.quotient_map' {t : Setoid Y} {f : X → Y} (hf : Continuous f)
(H : (s.r ⇒ t.r) f f) : Continuous (Quotient.map' f H) :=
(continuous_quotient_mk'.comp hf).quotient_lift _
end Quotient
section Pi
variable {ι : Type*} {π : ι → Type*} {κ : Type*} [TopologicalSpace X]
[T : ∀ i, TopologicalSpace (π i)] {f : X → ∀ i : ι, π i}
theorem continuous_pi_iff : Continuous f ↔ ∀ i, Continuous fun a => f a i := by
simp only [continuous_iInf_rng, continuous_induced_rng, comp_def]
@[continuity, fun_prop]
theorem continuous_pi (h : ∀ i, Continuous fun a => f a i) : Continuous f :=
continuous_pi_iff.2 h
@[continuity, fun_prop]
theorem continuous_apply (i : ι) : Continuous fun p : ∀ i, π i => p i :=
continuous_iInf_dom continuous_induced_dom
@[continuity]
theorem continuous_apply_apply {ρ : κ → ι → Type*} [∀ j i, TopologicalSpace (ρ j i)] (j : κ)
(i : ι) : Continuous fun p : ∀ j, ∀ i, ρ j i => p j i :=
(continuous_apply i).comp (continuous_apply j)
theorem continuousAt_apply (i : ι) (x : ∀ i, π i) : ContinuousAt (fun p : ∀ i, π i => p i) x :=
(continuous_apply i).continuousAt
theorem Filter.Tendsto.apply_nhds {l : Filter Y} {f : Y → ∀ i, π i} {x : ∀ i, π i}
(h : Tendsto f l (𝓝 x)) (i : ι) : Tendsto (fun a => f a i) l (𝓝 <| x i) :=
(continuousAt_apply i _).tendsto.comp h
@[fun_prop]
protected theorem Continuous.piMap {Y : ι → Type*} [∀ i, TopologicalSpace (Y i)]
{f : ∀ i, π i → Y i} (hf : ∀ i, Continuous (f i)) : Continuous (Pi.map f) :=
continuous_pi fun i ↦ (hf i).comp (continuous_apply i)
theorem nhds_pi {a : ∀ i, π i} : 𝓝 a = pi fun i => 𝓝 (a i) := by
simp only [nhds_iInf, nhds_induced, Filter.pi]
protected theorem IsOpenMap.piMap {Y : ι → Type*} [∀ i, TopologicalSpace (Y i)] {f : ∀ i, π i → Y i}
(hfo : ∀ i, IsOpenMap (f i)) (hsurj : ∀ᶠ i in cofinite, Surjective (f i)) :
IsOpenMap (Pi.map f) := by
refine IsOpenMap.of_nhds_le fun x ↦ ?_
rw [nhds_pi, nhds_pi, map_piMap_pi hsurj]
exact Filter.pi_mono fun i ↦ (hfo i).nhds_le _
protected theorem IsOpenQuotientMap.piMap {Y : ι → Type*} [∀ i, TopologicalSpace (Y i)]
{f : ∀ i, π i → Y i} (hf : ∀ i, IsOpenQuotientMap (f i)) : IsOpenQuotientMap (Pi.map f) :=
⟨.piMap fun i ↦ (hf i).1, .piMap fun i ↦ (hf i).2, .piMap (fun i ↦ (hf i).3) <|
.of_forall fun i ↦ (hf i).1⟩
theorem tendsto_pi_nhds {f : Y → ∀ i, π i} {g : ∀ i, π i} {u : Filter Y} :
Tendsto f u (𝓝 g) ↔ ∀ x, Tendsto (fun i => f i x) u (𝓝 (g x)) := by
rw [nhds_pi, Filter.tendsto_pi]
theorem continuousAt_pi {f : X → ∀ i, π i} {x : X} :
ContinuousAt f x ↔ ∀ i, ContinuousAt (fun y => f y i) x :=
tendsto_pi_nhds
@[fun_prop]
theorem continuousAt_pi' {f : X → ∀ i, π i} {x : X} (hf : ∀ i, ContinuousAt (fun y => f y i) x) :
ContinuousAt f x :=
continuousAt_pi.2 hf
@[fun_prop]
protected theorem ContinuousAt.piMap {Y : ι → Type*} [∀ i, TopologicalSpace (Y i)]
{f : ∀ i, π i → Y i} {x : ∀ i, π i} (hf : ∀ i, ContinuousAt (f i) (x i)) :
ContinuousAt (Pi.map f) x :=
continuousAt_pi.2 fun i ↦ (hf i).comp (continuousAt_apply i x)
theorem Pi.continuous_precomp' {ι' : Type*} (φ : ι' → ι) :
Continuous (fun (f : (∀ i, π i)) (j : ι') ↦ f (φ j)) :=
continuous_pi fun j ↦ continuous_apply (φ j)
theorem Pi.continuous_precomp {ι' : Type*} (φ : ι' → ι) :
Continuous (· ∘ φ : (ι → X) → (ι' → X)) :=
Pi.continuous_precomp' φ
theorem Pi.continuous_postcomp' {X : ι → Type*} [∀ i, TopologicalSpace (X i)]
{g : ∀ i, π i → X i} (hg : ∀ i, Continuous (g i)) :
Continuous (fun (f : (∀ i, π i)) (i : ι) ↦ g i (f i)) :=
continuous_pi fun i ↦ (hg i).comp <| continuous_apply i
theorem Pi.continuous_postcomp [TopologicalSpace Y] {g : X → Y} (hg : Continuous g) :
Continuous (g ∘ · : (ι → X) → (ι → Y)) :=
Pi.continuous_postcomp' fun _ ↦ hg
lemma Pi.induced_precomp' {ι' : Type*} (φ : ι' → ι) :
induced (fun (f : (∀ i, π i)) (j : ι') ↦ f (φ j)) Pi.topologicalSpace =
⨅ i', induced (eval (φ i')) (T (φ i')) := by
simp [Pi.topologicalSpace, induced_iInf, induced_compose, comp_def]
lemma Pi.induced_precomp [TopologicalSpace Y] {ι' : Type*} (φ : ι' → ι) :
induced (· ∘ φ) Pi.topologicalSpace =
⨅ i', induced (eval (φ i')) ‹TopologicalSpace Y› :=
induced_precomp' φ
@[continuity, fun_prop]
lemma Pi.continuous_restrict (S : Set ι) :
Continuous (S.restrict : (∀ i : ι, π i) → (∀ i : S, π i)) :=
Pi.continuous_precomp' ((↑) : S → ι)
@[continuity, fun_prop]
lemma Pi.continuous_restrict₂ {s t : Set ι} (hst : s ⊆ t) : Continuous (restrict₂ (π := π) hst) :=
continuous_pi fun _ ↦ continuous_apply _
@[continuity, fun_prop]
theorem Finset.continuous_restrict (s : Finset ι) : Continuous (s.restrict (π := π)) :=
continuous_pi fun _ ↦ continuous_apply _
@[continuity, fun_prop]
theorem Finset.continuous_restrict₂ {s t : Finset ι} (hst : s ⊆ t) :
Continuous (Finset.restrict₂ (π := π) hst) :=
continuous_pi fun _ ↦ continuous_apply _
variable [TopologicalSpace Z]
@[continuity, fun_prop]
theorem Pi.continuous_restrict_apply (s : Set X) {f : X → Z} (hf : Continuous f) :
Continuous (s.restrict f) := hf.comp continuous_subtype_val
@[continuity, fun_prop]
theorem Pi.continuous_restrict₂_apply {s t : Set X} (hst : s ⊆ t)
{f : t → Z} (hf : Continuous f) :
Continuous (restrict₂ (π := fun _ ↦ Z) hst f) := hf.comp (continuous_inclusion hst)
@[continuity, fun_prop]
theorem Finset.continuous_restrict_apply (s : Finset X) {f : X → Z} (hf : Continuous f) :
Continuous (s.restrict f) := hf.comp continuous_subtype_val
@[continuity, fun_prop]
theorem Finset.continuous_restrict₂_apply {s t : Finset X} (hst : s ⊆ t)
{f : t → Z} (hf : Continuous f) :
Continuous (restrict₂ (π := fun _ ↦ Z) hst f) := hf.comp (continuous_inclusion hst)
lemma Pi.induced_restrict (S : Set ι) :
induced (S.restrict) Pi.topologicalSpace =
⨅ i ∈ S, induced (eval i) (T i) := by
simp +unfoldPartialApp [← iInf_subtype'', ← induced_precomp' ((↑) : S → ι),
restrict]
lemma Pi.induced_restrict_sUnion (𝔖 : Set (Set ι)) :
induced (⋃₀ 𝔖).restrict (Pi.topologicalSpace (Y := fun i : (⋃₀ 𝔖) ↦ π i)) =
⨅ S ∈ 𝔖, induced S.restrict Pi.topologicalSpace := by
simp_rw [Pi.induced_restrict, iInf_sUnion]
theorem Filter.Tendsto.update [DecidableEq ι] {l : Filter Y} {f : Y → ∀ i, π i} {x : ∀ i, π i}
(hf : Tendsto f l (𝓝 x)) (i : ι) {g : Y → π i} {xi : π i} (hg : Tendsto g l (𝓝 xi)) :
Tendsto (fun a => update (f a) i (g a)) l (𝓝 <| update x i xi) :=
tendsto_pi_nhds.2 fun j => by rcases eq_or_ne j i with (rfl | hj) <;> simp [*, hf.apply_nhds]
theorem ContinuousAt.update [DecidableEq ι] {x : X} (hf : ContinuousAt f x) (i : ι) {g : X → π i}
(hg : ContinuousAt g x) : ContinuousAt (fun a => update (f a) i (g a)) x :=
hf.tendsto.update i hg
theorem Continuous.update [DecidableEq ι] (hf : Continuous f) (i : ι) {g : X → π i}
(hg : Continuous g) : Continuous fun a => update (f a) i (g a) :=
continuous_iff_continuousAt.2 fun _ => hf.continuousAt.update i hg.continuousAt
/-- `Function.update f i x` is continuous in `(f, x)`. -/
@[continuity, fun_prop]
theorem continuous_update [DecidableEq ι] (i : ι) :
Continuous fun f : (∀ j, π j) × π i => update f.1 i f.2 :=
continuous_fst.update i continuous_snd
/-- `Pi.mulSingle i x` is continuous in `x`. -/
@[to_additive (attr := continuity) "`Pi.single i x` is continuous in `x`."]
theorem continuous_mulSingle [∀ i, One (π i)] [DecidableEq ι] (i : ι) :
Continuous fun x => (Pi.mulSingle i x : ∀ i, π i) :=
continuous_const.update _ continuous_id
section Fin
variable {n : ℕ} {π : Fin (n + 1) → Type*} [∀ i, TopologicalSpace (π i)]
theorem Filter.Tendsto.finCons
{f : Y → π 0} {g : Y → ∀ j : Fin n, π j.succ} {l : Filter Y} {x : π 0} {y : ∀ j, π (Fin.succ j)}
(hf : Tendsto f l (𝓝 x)) (hg : Tendsto g l (𝓝 y)) :
Tendsto (fun a => Fin.cons (f a) (g a)) l (𝓝 <| Fin.cons x y) :=
tendsto_pi_nhds.2 fun j => Fin.cases (by simpa) (by simpa using tendsto_pi_nhds.1 hg) j
theorem ContinuousAt.finCons {f : X → π 0} {g : X → ∀ j : Fin n, π (Fin.succ j)} {x : X}
(hf : ContinuousAt f x) (hg : ContinuousAt g x) :
ContinuousAt (fun a => Fin.cons (f a) (g a)) x :=
hf.tendsto.finCons hg
theorem Continuous.finCons {f : X → π 0} {g : X → ∀ j : Fin n, π (Fin.succ j)}
(hf : Continuous f) (hg : Continuous g) : Continuous fun a => Fin.cons (f a) (g a) :=
continuous_iff_continuousAt.2 fun _ => hf.continuousAt.finCons hg.continuousAt
theorem Filter.Tendsto.matrixVecCons
{f : Y → Z} {g : Y → Fin n → Z} {l : Filter Y} {x : Z} {y : Fin n → Z}
(hf : Tendsto f l (𝓝 x)) (hg : Tendsto g l (𝓝 y)) :
Tendsto (fun a => Matrix.vecCons (f a) (g a)) l (𝓝 <| Matrix.vecCons x y) :=
hf.finCons hg
theorem ContinuousAt.matrixVecCons
{f : X → Z} {g : X → Fin n → Z} {x : X} (hf : ContinuousAt f x) (hg : ContinuousAt g x) :
ContinuousAt (fun a => Matrix.vecCons (f a) (g a)) x :=
hf.finCons hg
theorem Continuous.matrixVecCons
{f : X → Z} {g : X → Fin n → Z} (hf : Continuous f) (hg : Continuous g) :
Continuous fun a => Matrix.vecCons (f a) (g a) :=
hf.finCons hg
theorem Filter.Tendsto.finSnoc
{f : Y → ∀ j : Fin n, π j.castSucc} {g : Y → π (Fin.last _)}
{l : Filter Y} {x : ∀ j, π (Fin.castSucc j)} {y : π (Fin.last _)}
(hf : Tendsto f l (𝓝 x)) (hg : Tendsto g l (𝓝 y)) :
Tendsto (fun a => Fin.snoc (f a) (g a)) l (𝓝 <| Fin.snoc x y) :=
tendsto_pi_nhds.2 fun j => Fin.lastCases (by simpa) (by simpa using tendsto_pi_nhds.1 hf) j
theorem ContinuousAt.finSnoc {f : X → ∀ j : Fin n, π j.castSucc} {g : X → π (Fin.last _)} {x : X}
(hf : ContinuousAt f x) (hg : ContinuousAt g x) :
ContinuousAt (fun a => Fin.snoc (f a) (g a)) x :=
hf.tendsto.finSnoc hg
theorem Continuous.finSnoc {f : X → ∀ j : Fin n, π j.castSucc} {g : X → π (Fin.last _)}
(hf : Continuous f) (hg : Continuous g) : Continuous fun a => Fin.snoc (f a) (g a) :=
continuous_iff_continuousAt.2 fun _ => hf.continuousAt.finSnoc hg.continuousAt
theorem Filter.Tendsto.finInsertNth
(i : Fin (n + 1)) {f : Y → π i} {g : Y → ∀ j : Fin n, π (i.succAbove j)} {l : Filter Y}
{x : π i} {y : ∀ j, π (i.succAbove j)} (hf : Tendsto f l (𝓝 x)) (hg : Tendsto g l (𝓝 y)) :
Tendsto (fun a => i.insertNth (f a) (g a)) l (𝓝 <| i.insertNth x y) :=
tendsto_pi_nhds.2 fun j => Fin.succAboveCases i (by simpa) (by simpa using tendsto_pi_nhds.1 hg) j
@[deprecated (since := "2025-01-02")]
alias Filter.Tendsto.fin_insertNth := Filter.Tendsto.finInsertNth
theorem ContinuousAt.finInsertNth
(i : Fin (n + 1)) {f : X → π i} {g : X → ∀ j : Fin n, π (i.succAbove j)} {x : X}
(hf : ContinuousAt f x) (hg : ContinuousAt g x) :
ContinuousAt (fun a => i.insertNth (f a) (g a)) x :=
hf.tendsto.finInsertNth i hg
@[deprecated (since := "2025-01-02")]
alias ContinuousAt.fin_insertNth := ContinuousAt.finInsertNth
theorem Continuous.finInsertNth
(i : Fin (n + 1)) {f : X → π i} {g : X → ∀ j : Fin n, π (i.succAbove j)}
(hf : Continuous f) (hg : Continuous g) : Continuous fun a => i.insertNth (f a) (g a) :=
continuous_iff_continuousAt.2 fun _ => hf.continuousAt.finInsertNth i hg.continuousAt
@[deprecated (since := "2025-01-02")]
alias Continuous.fin_insertNth := Continuous.finInsertNth
theorem Filter.Tendsto.finInit {f : Y → ∀ j : Fin (n + 1), π j} {l : Filter Y} {x : ∀ j, π j}
(hg : Tendsto f l (𝓝 x)) : Tendsto (fun a ↦ Fin.init (f a)) l (𝓝 <| Fin.init x) :=
tendsto_pi_nhds.2 fun j ↦ apply_nhds hg j.castSucc
@[fun_prop]
theorem ContinuousAt.finInit {f : X → ∀ j : Fin (n + 1), π j} {x : X}
(hf : ContinuousAt f x) : ContinuousAt (fun a ↦ Fin.init (f a)) x :=
hf.tendsto.finInit
@[fun_prop]
theorem Continuous.finInit {f : X → ∀ j : Fin (n + 1), π j} (hf : Continuous f) :
Continuous fun a ↦ Fin.init (f a) :=
continuous_iff_continuousAt.2 fun _ ↦ hf.continuousAt.finInit
theorem Filter.Tendsto.finTail {f : Y → ∀ j : Fin (n + 1), π j} {l : Filter Y} {x : ∀ j, π j}
(hg : Tendsto f l (𝓝 x)) : Tendsto (fun a ↦ Fin.tail (f a)) l (𝓝 <| Fin.tail x) :=
tendsto_pi_nhds.2 fun j ↦ apply_nhds hg j.succ
@[fun_prop]
theorem ContinuousAt.finTail {f : X → ∀ j : Fin (n + 1), π j} {x : X}
(hf : ContinuousAt f x) : ContinuousAt (fun a ↦ Fin.tail (f a)) x :=
hf.tendsto.finTail
@[fun_prop]
theorem Continuous.finTail {f : X → ∀ j : Fin (n + 1), π j} (hf : Continuous f) :
Continuous fun a ↦ Fin.tail (f a) :=
continuous_iff_continuousAt.2 fun _ ↦ hf.continuousAt.finTail
end Fin
theorem isOpen_set_pi {i : Set ι} {s : ∀ a, Set (π a)} (hi : i.Finite)
(hs : ∀ a ∈ i, IsOpen (s a)) : IsOpen (pi i s) := by
rw [pi_def]; exact hi.isOpen_biInter fun a ha => (hs _ ha).preimage (continuous_apply _)
theorem isOpen_pi_iff {s : Set (∀ a, π a)} :
IsOpen s ↔
∀ f, f ∈ s → ∃ (I : Finset ι) (u : ∀ a, Set (π a)),
(∀ a, a ∈ I → IsOpen (u a) ∧ f a ∈ u a) ∧ (I : Set ι).pi u ⊆ s := by
rw [isOpen_iff_nhds]
simp_rw [le_principal_iff, nhds_pi, Filter.mem_pi', mem_nhds_iff]
refine forall₂_congr fun a _ => ⟨?_, ?_⟩
· rintro ⟨I, t, ⟨h1, h2⟩⟩
refine ⟨I, fun a => eval a '' (I : Set ι).pi fun a => (h1 a).choose, fun i hi => ?_, ?_⟩
· simp_rw [eval_image_pi (Finset.mem_coe.mpr hi)
(pi_nonempty_iff.mpr fun i => ⟨_, fun _ => (h1 i).choose_spec.2.2⟩)]
exact (h1 i).choose_spec.2
· exact Subset.trans
(pi_mono fun i hi => (eval_image_pi_subset hi).trans (h1 i).choose_spec.1) h2
· rintro ⟨I, t, ⟨h1, h2⟩⟩
classical
refine ⟨I, fun a => ite (a ∈ I) (t a) univ, fun i => ?_, ?_⟩
· by_cases hi : i ∈ I
· use t i
simp_rw [if_pos hi]
exact ⟨Subset.rfl, (h1 i) hi⟩
· use univ
simp_rw [if_neg hi]
exact ⟨Subset.rfl, isOpen_univ, mem_univ _⟩
· rw [← univ_pi_ite]
simp only [← ite_and, ← Finset.mem_coe, and_self_iff, univ_pi_ite, h2]
theorem isOpen_pi_iff' [Finite ι] {s : Set (∀ a, π a)} :
IsOpen s ↔
∀ f, f ∈ s → ∃ u : ∀ a, Set (π a), (∀ a, IsOpen (u a) ∧ f a ∈ u a) ∧ univ.pi u ⊆ s := by
cases nonempty_fintype ι
rw [isOpen_iff_nhds]
simp_rw [le_principal_iff, nhds_pi, Filter.mem_pi', mem_nhds_iff]
refine forall₂_congr fun a _ => ⟨?_, ?_⟩
· rintro ⟨I, t, ⟨h1, h2⟩⟩
refine
⟨fun i => (h1 i).choose,
⟨fun i => (h1 i).choose_spec.2,
(pi_mono fun i _ => (h1 i).choose_spec.1).trans (Subset.trans ?_ h2)⟩⟩
rw [← pi_inter_compl (I : Set ι)]
exact inter_subset_left
· exact fun ⟨u, ⟨h1, _⟩⟩ =>
⟨Finset.univ, u, ⟨fun i => ⟨u i, ⟨rfl.subset, h1 i⟩⟩, by rwa [Finset.coe_univ]⟩⟩
theorem isClosed_set_pi {i : Set ι} {s : ∀ a, Set (π a)} (hs : ∀ a ∈ i, IsClosed (s a)) :
IsClosed (pi i s) := by
rw [pi_def]; exact isClosed_biInter fun a ha => (hs _ ha).preimage (continuous_apply _)
theorem mem_nhds_of_pi_mem_nhds {I : Set ι} {s : ∀ i, Set (π i)} (a : ∀ i, π i) (hs : I.pi s ∈ 𝓝 a)
{i : ι} (hi : i ∈ I) : s i ∈ 𝓝 (a i) := by
rw [nhds_pi] at hs; exact mem_of_pi_mem_pi hs hi
theorem set_pi_mem_nhds {i : Set ι} {s : ∀ a, Set (π a)} {x : ∀ a, π a} (hi : i.Finite)
(hs : ∀ a ∈ i, s a ∈ 𝓝 (x a)) : pi i s ∈ 𝓝 x := by
rw [pi_def, biInter_mem hi]
exact fun a ha => (continuous_apply a).continuousAt (hs a ha)
theorem set_pi_mem_nhds_iff {I : Set ι} (hI : I.Finite) {s : ∀ i, Set (π i)} (a : ∀ i, π i) :
I.pi s ∈ 𝓝 a ↔ ∀ i : ι, i ∈ I → s i ∈ 𝓝 (a i) := by
rw [nhds_pi, pi_mem_pi_iff hI]
theorem interior_pi_set {I : Set ι} (hI : I.Finite) {s : ∀ i, Set (π i)} :
interior (pi I s) = I.pi fun i => interior (s i) := by
ext a
simp only [Set.mem_pi, mem_interior_iff_mem_nhds, set_pi_mem_nhds_iff hI]
theorem exists_finset_piecewise_mem_of_mem_nhds [DecidableEq ι] {s : Set (∀ a, π a)} {x : ∀ a, π a}
(hs : s ∈ 𝓝 x) (y : ∀ a, π a) : ∃ I : Finset ι, I.piecewise x y ∈ s := by
simp only [nhds_pi, Filter.mem_pi'] at hs
rcases hs with ⟨I, t, htx, hts⟩
refine ⟨I, hts fun i hi => ?_⟩
simpa [Finset.mem_coe.1 hi] using mem_of_mem_nhds (htx i)
theorem pi_generateFrom_eq {π : ι → Type*} {g : ∀ a, Set (Set (π a))} :
(@Pi.topologicalSpace ι π fun a => generateFrom (g a)) =
generateFrom
{ t | ∃ (s : ∀ a, Set (π a)) (i : Finset ι), (∀ a ∈ i, s a ∈ g a) ∧ t = pi (↑i) s } := by
refine le_antisymm ?_ ?_
· apply le_generateFrom
rintro _ ⟨s, i, hi, rfl⟩
letI := fun a => generateFrom (g a)
exact isOpen_set_pi i.finite_toSet (fun a ha => GenerateOpen.basic _ (hi a ha))
· classical
refine le_iInf fun i => coinduced_le_iff_le_induced.1 <| le_generateFrom fun s hs => ?_
refine GenerateOpen.basic _ ⟨update (fun i => univ) i s, {i}, ?_⟩
simp [hs]
theorem pi_eq_generateFrom :
Pi.topologicalSpace =
generateFrom
{ g | ∃ (s : ∀ a, Set (π a)) (i : Finset ι), (∀ a ∈ i, IsOpen (s a)) ∧ g = pi (↑i) s } :=
calc Pi.topologicalSpace
_ = @Pi.topologicalSpace ι π fun _ => generateFrom { s | IsOpen s } := by
simp only [generateFrom_setOf_isOpen]
_ = _ := pi_generateFrom_eq
theorem pi_generateFrom_eq_finite {π : ι → Type*} {g : ∀ a, Set (Set (π a))} [Finite ι]
(hg : ∀ a, ⋃₀ g a = univ) :
(@Pi.topologicalSpace ι π fun a => generateFrom (g a)) =
generateFrom { t | ∃ s : ∀ a, Set (π a), (∀ a, s a ∈ g a) ∧ t = pi univ s } := by
cases nonempty_fintype ι
rw [pi_generateFrom_eq]
refine le_antisymm (generateFrom_anti ?_) (le_generateFrom ?_)
· exact fun s ⟨t, ht, Eq⟩ => ⟨t, Finset.univ, by simp [ht, Eq]⟩
· rintro s ⟨t, i, ht, rfl⟩
letI := generateFrom { t | ∃ s : ∀ a, Set (π a), (∀ a, s a ∈ g a) ∧ t = pi univ s }
refine isOpen_iff_forall_mem_open.2 fun f hf => ?_
choose c hcg hfc using fun a => sUnion_eq_univ_iff.1 (hg a) (f a)
refine ⟨pi i t ∩ pi ((↑i)ᶜ : Set ι) c, inter_subset_left, ?_, ⟨hf, fun a _ => hfc a⟩⟩
classical
rw [← univ_pi_piecewise]
refine GenerateOpen.basic _ ⟨_, fun a => ?_, rfl⟩
by_cases a ∈ i <;> simp [*]
theorem induced_to_pi {X : Type*} (f : X → ∀ i, π i) :
induced f Pi.topologicalSpace = ⨅ i, induced (f · i) inferInstance := by
simp_rw [Pi.topologicalSpace, induced_iInf, induced_compose, Function.comp_def]
/-- Suppose `π i` is a family of topological spaces indexed by `i : ι`, and `X` is a type
endowed with a family of maps `f i : X → π i` for every `i : ι`, hence inducing a
map `g : X → Π i, π i`. This lemma shows that infimum of the topologies on `X` induced by
the `f i` as `i : ι` varies is simply the topology on `X` induced by `g : X → Π i, π i`
where `Π i, π i` is endowed with the usual product topology. -/
theorem inducing_iInf_to_pi {X : Type*} (f : ∀ i, X → π i) :
@IsInducing X (∀ i, π i) (⨅ i, induced (f i) inferInstance) _ fun x i => f i x :=
letI := ⨅ i, induced (f i) inferInstance; ⟨(induced_to_pi _).symm⟩
variable [Finite ι] [∀ i, DiscreteTopology (π i)]
/-- A finite product of discrete spaces is discrete. -/
instance Pi.discreteTopology : DiscreteTopology (∀ i, π i) :=
singletons_open_iff_discrete.mp fun x => by
rw [← univ_pi_singleton]
exact isOpen_set_pi finite_univ fun i _ => (isOpen_discrete {x i})
end Pi
section Sigma
variable {ι κ : Type*} {σ : ι → Type*} {τ : κ → Type*} [∀ i, TopologicalSpace (σ i)]
[∀ k, TopologicalSpace (τ k)] [TopologicalSpace X]
@[continuity, fun_prop]
theorem continuous_sigmaMk {i : ι} : Continuous (@Sigma.mk ι σ i) :=
continuous_iSup_rng continuous_coinduced_rng
theorem isOpen_sigma_iff {s : Set (Sigma σ)} : IsOpen s ↔ ∀ i, IsOpen (Sigma.mk i ⁻¹' s) := by
rw [isOpen_iSup_iff]
rfl
theorem isClosed_sigma_iff {s : Set (Sigma σ)} : IsClosed s ↔ ∀ i, IsClosed (Sigma.mk i ⁻¹' s) := by
simp only [← isOpen_compl_iff, isOpen_sigma_iff, preimage_compl]
theorem isOpenMap_sigmaMk {i : ι} : IsOpenMap (@Sigma.mk ι σ i) := by
intro s hs
rw [isOpen_sigma_iff]
intro j
rcases eq_or_ne j i with (rfl | hne)
· rwa [preimage_image_eq _ sigma_mk_injective]
· rw [preimage_image_sigmaMk_of_ne hne]
exact isOpen_empty
theorem isOpen_range_sigmaMk {i : ι} : IsOpen (range (@Sigma.mk ι σ i)) :=
isOpenMap_sigmaMk.isOpen_range
theorem isClosedMap_sigmaMk {i : ι} : IsClosedMap (@Sigma.mk ι σ i) := by
intro s hs
rw [isClosed_sigma_iff]
intro j
rcases eq_or_ne j i with (rfl | hne)
· rwa [preimage_image_eq _ sigma_mk_injective]
· rw [preimage_image_sigmaMk_of_ne hne]
exact isClosed_empty
theorem isClosed_range_sigmaMk {i : ι} : IsClosed (range (@Sigma.mk ι σ i)) :=
isClosedMap_sigmaMk.isClosed_range
lemma Topology.IsOpenEmbedding.sigmaMk {i : ι} : IsOpenEmbedding (@Sigma.mk ι σ i) :=
.of_continuous_injective_isOpenMap continuous_sigmaMk sigma_mk_injective isOpenMap_sigmaMk
@[deprecated (since := "2024-10-30")] alias isOpenEmbedding_sigmaMk := IsOpenEmbedding.sigmaMk
lemma Topology.IsClosedEmbedding.sigmaMk {i : ι} : IsClosedEmbedding (@Sigma.mk ι σ i) :=
.of_continuous_injective_isClosedMap continuous_sigmaMk sigma_mk_injective isClosedMap_sigmaMk
@[deprecated (since := "2024-10-30")] alias isClosedEmbedding_sigmaMk := IsClosedEmbedding.sigmaMk
lemma Topology.IsEmbedding.sigmaMk {i : ι} : IsEmbedding (@Sigma.mk ι σ i) :=
IsClosedEmbedding.sigmaMk.1
@[deprecated (since := "2024-10-26")]
alias embedding_sigmaMk := IsEmbedding.sigmaMk
theorem Sigma.nhds_mk (i : ι) (x : σ i) : 𝓝 (⟨i, x⟩ : Sigma σ) = Filter.map (Sigma.mk i) (𝓝 x) :=
(IsOpenEmbedding.sigmaMk.map_nhds_eq x).symm
theorem Sigma.nhds_eq (x : Sigma σ) : 𝓝 x = Filter.map (Sigma.mk x.1) (𝓝 x.2) := by
cases x
apply Sigma.nhds_mk
theorem comap_sigmaMk_nhds (i : ι) (x : σ i) : comap (Sigma.mk i) (𝓝 ⟨i, x⟩) = 𝓝 x :=
(IsEmbedding.sigmaMk.nhds_eq_comap _).symm
theorem isOpen_sigma_fst_preimage (s : Set ι) : IsOpen (Sigma.fst ⁻¹' s : Set (Σ a, σ a)) := by
rw [← biUnion_of_singleton s, preimage_iUnion₂]
simp only [← range_sigmaMk]
exact isOpen_biUnion fun _ _ => isOpen_range_sigmaMk
/-- A map out of a sum type is continuous iff its restriction to each summand is. -/
@[simp]
theorem continuous_sigma_iff {f : Sigma σ → X} :
Continuous f ↔ ∀ i, Continuous fun a => f ⟨i, a⟩ := by
delta instTopologicalSpaceSigma
rw [continuous_iSup_dom]
exact forall_congr' fun _ => continuous_coinduced_dom
/-- A map out of a sum type is continuous if its restriction to each summand is. -/
@[continuity, fun_prop]
theorem continuous_sigma {f : Sigma σ → X} (hf : ∀ i, Continuous fun a => f ⟨i, a⟩) :
Continuous f :=
continuous_sigma_iff.2 hf
/-- A map defined on a sigma type (a.k.a. the disjoint union of an indexed family of topological
spaces) is inducing iff its restriction to each component is inducing and each the image of each
component under `f` can be separated from the images of all other components by an open set. -/
theorem inducing_sigma {f : Sigma σ → X} :
IsInducing f ↔ (∀ i, IsInducing (f ∘ Sigma.mk i)) ∧
(∀ i, ∃ U, IsOpen U ∧ ∀ x, f x ∈ U ↔ x.1 = i) := by
refine ⟨fun h ↦ ⟨fun i ↦ h.comp IsEmbedding.sigmaMk.1, fun i ↦ ?_⟩, ?_⟩
· rcases h.isOpen_iff.1 (isOpen_range_sigmaMk (i := i)) with ⟨U, hUo, hU⟩
refine ⟨U, hUo, ?_⟩
simpa [Set.ext_iff] using hU
· refine fun ⟨h₁, h₂⟩ ↦ isInducing_iff_nhds.2 fun ⟨i, x⟩ ↦ ?_
rw [Sigma.nhds_mk, (h₁ i).nhds_eq_comap, comp_apply, ← comap_comap, map_comap_of_mem]
rcases h₂ i with ⟨U, hUo, hU⟩
filter_upwards [preimage_mem_comap <| hUo.mem_nhds <| (hU _).2 rfl] with y hy
simpa [hU] using hy
@[simp 1100]
theorem continuous_sigma_map {f₁ : ι → κ} {f₂ : ∀ i, σ i → τ (f₁ i)} :
Continuous (Sigma.map f₁ f₂) ↔ ∀ i, Continuous (f₂ i) :=
continuous_sigma_iff.trans <| by
simp only [Sigma.map, IsEmbedding.sigmaMk.continuous_iff, comp_def]
@[continuity, fun_prop]
theorem Continuous.sigma_map {f₁ : ι → κ} {f₂ : ∀ i, σ i → τ (f₁ i)} (hf : ∀ i, Continuous (f₂ i)) :
Continuous (Sigma.map f₁ f₂) :=
continuous_sigma_map.2 hf
theorem isOpenMap_sigma {f : Sigma σ → X} : IsOpenMap f ↔ ∀ i, IsOpenMap fun a => f ⟨i, a⟩ := by
simp only [isOpenMap_iff_nhds_le, Sigma.forall, Sigma.nhds_eq, map_map, comp_def]
theorem isOpenMap_sigma_map {f₁ : ι → κ} {f₂ : ∀ i, σ i → τ (f₁ i)} :
IsOpenMap (Sigma.map f₁ f₂) ↔ ∀ i, IsOpenMap (f₂ i) :=
isOpenMap_sigma.trans <|
forall_congr' fun i => (@IsOpenEmbedding.sigmaMk _ _ _ (f₁ i)).isOpenMap_iff.symm
lemma Topology.isInducing_sigmaMap {f₁ : ι → κ} {f₂ : ∀ i, σ i → τ (f₁ i)}
(h₁ : Injective f₁) : IsInducing (Sigma.map f₁ f₂) ↔ ∀ i, IsInducing (f₂ i) := by
simp only [isInducing_iff_nhds, Sigma.forall, Sigma.nhds_mk, Sigma.map_mk,
← map_sigma_mk_comap h₁, map_inj sigma_mk_injective]
@[deprecated (since := "2024-10-28")] alias inducing_sigma_map := isInducing_sigmaMap
lemma Topology.isEmbedding_sigmaMap {f₁ : ι → κ} {f₂ : ∀ i, σ i → τ (f₁ i)}
(h : Injective f₁) : IsEmbedding (Sigma.map f₁ f₂) ↔ ∀ i, IsEmbedding (f₂ i) := by
simp only [isEmbedding_iff, Injective.sigma_map, isInducing_sigmaMap h, forall_and,
h.sigma_map_iff]
@[deprecated (since := "2024-10-26")]
alias embedding_sigma_map := isEmbedding_sigmaMap
lemma Topology.isOpenEmbedding_sigmaMap {f₁ : ι → κ} {f₂ : ∀ i, σ i → τ (f₁ i)} (h : Injective f₁) :
IsOpenEmbedding (Sigma.map f₁ f₂) ↔ ∀ i, IsOpenEmbedding (f₂ i) := by
simp only [isOpenEmbedding_iff_isEmbedding_isOpenMap, isOpenMap_sigma_map, isEmbedding_sigmaMap h,
forall_and]
@[deprecated (since := "2024-10-30")] alias isOpenEmbedding_sigma_map := isOpenEmbedding_sigmaMap
end Sigma
section ULift
theorem ULift.isOpen_iff [TopologicalSpace X] {s : Set (ULift.{v} X)} :
IsOpen s ↔ IsOpen (ULift.up ⁻¹' s) := by
rw [ULift.topologicalSpace, ← Equiv.ulift_apply, ← Equiv.ulift.coinduced_symm, ← isOpen_coinduced]
theorem ULift.isClosed_iff [TopologicalSpace X] {s : Set (ULift.{v} X)} :
IsClosed s ↔ IsClosed (ULift.up ⁻¹' s) := by
rw [← isOpen_compl_iff, ← isOpen_compl_iff, isOpen_iff, preimage_compl]
@[continuity, fun_prop]
theorem continuous_uliftDown [TopologicalSpace X] : Continuous (ULift.down : ULift.{v, u} X → X) :=
continuous_induced_dom
@[continuity, fun_prop]
theorem continuous_uliftUp [TopologicalSpace X] : Continuous (ULift.up : X → ULift.{v, u} X) :=
continuous_induced_rng.2 continuous_id
@[deprecated (since := "2025-02-10")] alias continuous_uLift_down := continuous_uliftDown
@[deprecated (since := "2025-02-10")] alias continuous_uLift_up := continuous_uliftUp
@[continuity, fun_prop]
theorem continuous_uliftMap [TopologicalSpace X] [TopologicalSpace Y]
(f : X → Y) (hf : Continuous f) :
Continuous (ULift.map f : ULift.{u'} X → ULift.{v'} Y) := by
change Continuous (ULift.up ∘ f ∘ ULift.down)
fun_prop
lemma Topology.IsEmbedding.uliftDown [TopologicalSpace X] :
IsEmbedding (ULift.down : ULift.{v, u} X → X) := ⟨⟨rfl⟩, ULift.down_injective⟩
@[deprecated (since := "2024-10-26")]
alias embedding_uLift_down := IsEmbedding.uliftDown
lemma Topology.IsClosedEmbedding.uliftDown [TopologicalSpace X] :
IsClosedEmbedding (ULift.down : ULift.{v, u} X → X) :=
⟨.uliftDown, by simp only [ULift.down_surjective.range_eq, isClosed_univ]⟩
@[deprecated (since := "2024-10-30")]
alias ULift.isClosedEmbedding_down := IsClosedEmbedding.uliftDown
instance [TopologicalSpace X] [DiscreteTopology X] : DiscreteTopology (ULift X) :=
IsEmbedding.uliftDown.discreteTopology
end ULift
section Monad
variable [TopologicalSpace X] {s : Set X} {t : Set s}
theorem IsOpen.trans (ht : IsOpen t) (hs : IsOpen s) : IsOpen (t : Set X) := by
rcases isOpen_induced_iff.mp ht with ⟨s', hs', rfl⟩
rw [Subtype.image_preimage_coe]
exact hs.inter hs'
theorem IsClosed.trans (ht : IsClosed t) (hs : IsClosed s) : IsClosed (t : Set X) := by
rcases isClosed_induced_iff.mp ht with ⟨s', hs', rfl⟩
rw [Subtype.image_preimage_coe]
exact hs.inter hs'
end Monad
section NhdsSet
variable [TopologicalSpace X] [TopologicalSpace Y]
{s : Set X} {t : Set Y}
/-- The product of a neighborhood of `s` and a neighborhood of `t` is a neighborhood of `s ×ˢ t`,
formulated in terms of a filter inequality. -/
theorem nhdsSet_prod_le (s : Set X) (t : Set Y) : 𝓝ˢ (s ×ˢ t) ≤ 𝓝ˢ s ×ˢ 𝓝ˢ t :=
((hasBasis_nhdsSet _).prod (hasBasis_nhdsSet _)).ge_iff.2 fun (_u, _v) ⟨⟨huo, hsu⟩, hvo, htv⟩ ↦
(huo.prod hvo).mem_nhdsSet.2 <| prod_mono hsu htv
theorem Filter.eventually_nhdsSet_prod_iff {p : X × Y → Prop} :
(∀ᶠ q in 𝓝ˢ (s ×ˢ t), p q) ↔
∀ x ∈ s, ∀ y ∈ t,
∃ px : X → Prop, (∀ᶠ x' in 𝓝 x, px x') ∧ ∃ py : Y → Prop, (∀ᶠ y' in 𝓝 y, py y') ∧
∀ {x : X}, px x → ∀ {y : Y}, py y → p (x, y) := by
simp_rw [eventually_nhdsSet_iff_forall, forall_prod_set, nhds_prod_eq, eventually_prod_iff]
theorem Filter.Eventually.prod_nhdsSet {p : X × Y → Prop} {px : X → Prop} {py : Y → Prop}
(hp : ∀ {x : X}, px x → ∀ {y : Y}, py y → p (x, y)) (hs : ∀ᶠ x in 𝓝ˢ s, px x)
(ht : ∀ᶠ y in 𝓝ˢ t, py y) : ∀ᶠ q in 𝓝ˢ (s ×ˢ t), p q :=
nhdsSet_prod_le _ _ (mem_of_superset (prod_mem_prod hs ht) fun _ ⟨hx, hy⟩ ↦ hp hx hy)
end NhdsSet
| Mathlib/Topology/Constructions.lean | 1,483 | 1,485 | |
/-
Copyright (c) 2020 Johan Commelin. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johan Commelin, Chris Hughes
-/
import Mathlib.Algebra.GeomSum
import Mathlib.Algebra.Polynomial.Roots
import Mathlib.Data.Fintype.Inv
import Mathlib.GroupTheory.SpecificGroups.Cyclic
import Mathlib.Tactic.FieldSimp
/-!
# Integral domains
Assorted theorems about integral domains.
## Main theorems
* `isCyclic_of_subgroup_isDomain`: A finite subgroup of the units of an integral domain is cyclic.
* `Fintype.fieldOfDomain`: A finite integral domain is a field.
## Notes
Wedderburn's little theorem, which shows that all finite division rings are actually fields,
is in `Mathlib.RingTheory.LittleWedderburn`.
## Tags
integral domain, finite integral domain, finite field
-/
section
open Finset Polynomial Function Nat
section CancelMonoidWithZero
-- There doesn't seem to be a better home for these right now
variable {M : Type*} [CancelMonoidWithZero M] [Finite M]
theorem mul_right_bijective_of_finite₀ {a : M} (ha : a ≠ 0) : Bijective fun b => a * b :=
Finite.injective_iff_bijective.1 <| mul_right_injective₀ ha
theorem mul_left_bijective_of_finite₀ {a : M} (ha : a ≠ 0) : Bijective fun b => b * a :=
Finite.injective_iff_bijective.1 <| mul_left_injective₀ ha
/-- Every finite nontrivial cancel_monoid_with_zero is a group_with_zero. -/
def Fintype.groupWithZeroOfCancel (M : Type*) [CancelMonoidWithZero M] [DecidableEq M] [Fintype M]
[Nontrivial M] : GroupWithZero M :=
{ ‹Nontrivial M›,
‹CancelMonoidWithZero M› with
inv := fun a => if h : a = 0 then 0 else Fintype.bijInv (mul_right_bijective_of_finite₀ h) 1
mul_inv_cancel := fun a ha => by
simp only [Inv.inv, dif_neg ha]
exact Fintype.rightInverse_bijInv _ _
inv_zero := by simp [Inv.inv, dif_pos rfl] }
theorem exists_eq_pow_of_mul_eq_pow_of_coprime {R : Type*} [CommSemiring R] [IsDomain R]
[GCDMonoid R] [Subsingleton Rˣ] {a b c : R} {n : ℕ} (cp : IsCoprime a b) (h : a * b = c ^ n) :
∃ d : R, a = d ^ n := by
refine exists_eq_pow_of_mul_eq_pow (isUnit_of_dvd_one ?_) h
obtain ⟨x, y, hxy⟩ := cp
rw [← hxy]
exact -- Porting note: added `GCDMonoid.` twice
dvd_add (dvd_mul_of_dvd_right (GCDMonoid.gcd_dvd_left _ _) _)
(dvd_mul_of_dvd_right (GCDMonoid.gcd_dvd_right _ _) _)
nonrec
theorem Finset.exists_eq_pow_of_mul_eq_pow_of_coprime {ι R : Type*} [CommSemiring R] [IsDomain R]
[GCDMonoid R] [Subsingleton Rˣ] {n : ℕ} {c : R} {s : Finset ι} {f : ι → R}
(h : ∀ i ∈ s, ∀ j ∈ s, i ≠ j → IsCoprime (f i) (f j))
(hprod : ∏ i ∈ s, f i = c ^ n) : ∀ i ∈ s, ∃ d : R, f i = d ^ n := by
classical
intro i hi
rw [← insert_erase hi, prod_insert (not_mem_erase i s)] at hprod
refine
exists_eq_pow_of_mul_eq_pow_of_coprime
(IsCoprime.prod_right fun j hj => h i hi j (erase_subset i s hj) fun hij => ?_) hprod
rw [hij] at hj
exact (s.not_mem_erase _) hj
end CancelMonoidWithZero
variable {R : Type*} {G : Type*}
section Ring
variable [Ring R] [IsDomain R] [Fintype R]
/-- Every finite domain is a division ring. More generally, they are fields; this can be found in
`Mathlib.RingTheory.LittleWedderburn`. -/
def Fintype.divisionRingOfIsDomain (R : Type*) [Ring R] [IsDomain R] [DecidableEq R] [Fintype R] :
DivisionRing R where
__ := (‹Ring R›:) -- this also works without the `( :)`, but it's slightly slow
__ := Fintype.groupWithZeroOfCancel R
nnqsmul := _
nnqsmul_def := fun _ _ => rfl
qsmul := _
qsmul_def := fun _ _ => rfl
/-- Every finite commutative domain is a field. More generally, commutativity is not required: this
can be found in `Mathlib.RingTheory.LittleWedderburn`. -/
def Fintype.fieldOfDomain (R) [CommRing R] [IsDomain R] [DecidableEq R] [Fintype R] : Field R :=
{ Fintype.divisionRingOfIsDomain R, ‹CommRing R› with }
theorem Finite.isField_of_domain (R) [CommRing R] [IsDomain R] [Finite R] : IsField R := by
cases nonempty_fintype R
exact @Field.toIsField R (@Fintype.fieldOfDomain R _ _ (Classical.decEq R) _)
end Ring
variable [CommRing R] [IsDomain R] [Group G]
theorem card_nthRoots_subgroup_units [Fintype G] [DecidableEq G] (f : G →* R) (hf : Injective f)
{n : ℕ} (hn : 0 < n) (g₀ : G) :
#{g | g ^ n = g₀} ≤ Multiset.card (nthRoots n (f g₀)) := by
haveI : DecidableEq R := Classical.decEq _
calc
_ ≤ #(nthRoots n (f g₀)).toFinset := card_le_card_of_injOn f (by aesop) hf.injOn
_ ≤ _ := (nthRoots n (f g₀)).toFinset_card_le
/-- A finite subgroup of the unit group of an integral domain is cyclic. -/
theorem isCyclic_of_subgroup_isDomain [Finite G] (f : G →* R) (hf : Injective f) : IsCyclic G := by
classical
cases nonempty_fintype G
apply isCyclic_of_card_pow_eq_one_le
intro n hn
exact le_trans (card_nthRoots_subgroup_units f hf hn 1) (card_nthRoots n (f 1))
/-- The unit group of a finite integral domain is cyclic.
| To support `ℤˣ` and other infinite monoids with finite groups of units, this requires only
`Finite Rˣ` rather than deducing it from `Finite R`. -/
instance [Finite Rˣ] : IsCyclic Rˣ :=
isCyclic_of_subgroup_isDomain (Units.coeHom R) <| Units.ext
section
| Mathlib/RingTheory/IntegralDomain.lean | 132 | 137 |
/-
Copyright (c) 2018 Kim Morrison. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Reid Barton, Mario Carneiro, Kim Morrison, Floris van Doorn
-/
import Mathlib.CategoryTheory.Adjunction.Basic
import Mathlib.CategoryTheory.Limits.Cones
import Batteries.Tactic.Congr
/-!
# Limits and colimits
We set up the general theory of limits and colimits in a category.
In this introduction we only describe the setup for limits;
it is repeated, with slightly different names, for colimits.
The main structures defined in this file is
* `IsLimit c`, for `c : Cone F`, `F : J ⥤ C`, expressing that `c` is a limit cone,
See also `CategoryTheory.Limits.HasLimits` which further builds:
* `LimitCone F`, which consists of a choice of cone for `F` and the fact it is a limit cone, and
* `HasLimit F`, asserting the mere existence of some limit cone for `F`.
## Implementation
At present we simply say everything twice, in order to handle both limits and colimits.
It would be highly desirable to have some automation support,
e.g. a `@[dualize]` attribute that behaves similarly to `@[to_additive]`.
## References
* [Stacks: Limits and colimits](https://stacks.math.columbia.edu/tag/002D)
-/
noncomputable section
open CategoryTheory CategoryTheory.Category CategoryTheory.Functor Opposite
namespace CategoryTheory.Limits
-- declare the `v`'s first; see `CategoryTheory.Category` for an explanation
universe v₁ v₂ v₃ v₄ u₁ u₂ u₃ u₄
variable {J : Type u₁} [Category.{v₁} J] {K : Type u₂} [Category.{v₂} K]
variable {C : Type u₃} [Category.{v₃} C]
variable {F : J ⥤ C}
/-- A cone `t` on `F` is a limit cone if each cone on `F` admits a unique
cone morphism to `t`. -/
@[stacks 002E]
structure IsLimit (t : Cone F) where
/-- There is a morphism from any cone point to `t.pt` -/
lift : ∀ s : Cone F, s.pt ⟶ t.pt
/-- The map makes the triangle with the two natural transformations commute -/
fac : ∀ (s : Cone F) (j : J), lift s ≫ t.π.app j = s.π.app j := by aesop_cat
/-- It is the unique such map to do this -/
uniq : ∀ (s : Cone F) (m : s.pt ⟶ t.pt) (_ : ∀ j : J, m ≫ t.π.app j = s.π.app j), m = lift s := by
aesop_cat
attribute [reassoc (attr := simp)] IsLimit.fac
namespace IsLimit
instance subsingleton {t : Cone F} : Subsingleton (IsLimit t) :=
⟨by intro P Q; cases P; cases Q; congr; aesop_cat⟩
/-- Given a natural transformation `α : F ⟶ G`, we give a morphism from the cone point
of any cone over `F` to the cone point of a limit cone over `G`. -/
def map {F G : J ⥤ C} (s : Cone F) {t : Cone G} (P : IsLimit t) (α : F ⟶ G) : s.pt ⟶ t.pt :=
P.lift ((Cones.postcompose α).obj s)
@[reassoc (attr := simp)]
theorem map_π {F G : J ⥤ C} (c : Cone F) {d : Cone G} (hd : IsLimit d) (α : F ⟶ G) (j : J) :
hd.map c α ≫ d.π.app j = c.π.app j ≫ α.app j :=
fac _ _ _
@[simp]
theorem lift_self {c : Cone F} (t : IsLimit c) : t.lift c = 𝟙 c.pt :=
(t.uniq _ _ fun _ => id_comp _).symm
-- Repackaging the definition in terms of cone morphisms.
/-- The universal morphism from any other cone to a limit cone. -/
@[simps]
def liftConeMorphism {t : Cone F} (h : IsLimit t) (s : Cone F) : s ⟶ t where hom := h.lift s
theorem uniq_cone_morphism {s t : Cone F} (h : IsLimit t) {f f' : s ⟶ t} : f = f' :=
have : ∀ {g : s ⟶ t}, g = h.liftConeMorphism s := by
intro g; apply ConeMorphism.ext; exact h.uniq _ _ g.w
this.trans this.symm
/-- Restating the definition of a limit cone in terms of the ∃! operator. -/
theorem existsUnique {t : Cone F} (h : IsLimit t) (s : Cone F) :
∃! l : s.pt ⟶ t.pt, ∀ j, l ≫ t.π.app j = s.π.app j :=
⟨h.lift s, h.fac s, h.uniq s⟩
/-- Noncomputably make a limit cone from the existence of unique factorizations. -/
def ofExistsUnique {t : Cone F}
(ht : ∀ s : Cone F, ∃! l : s.pt ⟶ t.pt, ∀ j, l ≫ t.π.app j = s.π.app j) : IsLimit t := by
choose s hs hs' using ht
exact ⟨s, hs, hs'⟩
/-- Alternative constructor for `isLimit`,
providing a morphism of cones rather than a morphism between the cone points
and separately the factorisation condition.
-/
@[simps]
def mkConeMorphism {t : Cone F} (lift : ∀ s : Cone F, s ⟶ t)
(uniq : ∀ (s : Cone F) (m : s ⟶ t), m = lift s) : IsLimit t where
lift s := (lift s).hom
uniq s m w :=
have : ConeMorphism.mk m w = lift s := by apply uniq
congrArg ConeMorphism.hom this
/-- Limit cones on `F` are unique up to isomorphism. -/
@[simps]
def uniqueUpToIso {s t : Cone F} (P : IsLimit s) (Q : IsLimit t) : s ≅ t where
hom := Q.liftConeMorphism s
inv := P.liftConeMorphism t
hom_inv_id := P.uniq_cone_morphism
inv_hom_id := Q.uniq_cone_morphism
/-- Any cone morphism between limit cones is an isomorphism. -/
theorem hom_isIso {s t : Cone F} (P : IsLimit s) (Q : IsLimit t) (f : s ⟶ t) : IsIso f :=
⟨⟨P.liftConeMorphism t, ⟨P.uniq_cone_morphism, Q.uniq_cone_morphism⟩⟩⟩
/-- Limits of `F` are unique up to isomorphism. -/
def conePointUniqueUpToIso {s t : Cone F} (P : IsLimit s) (Q : IsLimit t) : s.pt ≅ t.pt :=
(Cones.forget F).mapIso (uniqueUpToIso P Q)
@[reassoc (attr := simp)]
theorem conePointUniqueUpToIso_hom_comp {s t : Cone F} (P : IsLimit s) (Q : IsLimit t) (j : J) :
(conePointUniqueUpToIso P Q).hom ≫ t.π.app j = s.π.app j :=
(uniqueUpToIso P Q).hom.w _
@[reassoc (attr := simp)]
theorem conePointUniqueUpToIso_inv_comp {s t : Cone F} (P : IsLimit s) (Q : IsLimit t) (j : J) :
(conePointUniqueUpToIso P Q).inv ≫ s.π.app j = t.π.app j :=
(uniqueUpToIso P Q).inv.w _
@[reassoc (attr := simp)]
theorem lift_comp_conePointUniqueUpToIso_hom {r s t : Cone F} (P : IsLimit s) (Q : IsLimit t) :
P.lift r ≫ (conePointUniqueUpToIso P Q).hom = Q.lift r :=
Q.uniq _ _ (by simp)
@[reassoc (attr := simp)]
theorem lift_comp_conePointUniqueUpToIso_inv {r s t : Cone F} (P : IsLimit s) (Q : IsLimit t) :
Q.lift r ≫ (conePointUniqueUpToIso P Q).inv = P.lift r :=
P.uniq _ _ (by simp)
/-- Transport evidence that a cone is a limit cone across an isomorphism of cones. -/
def ofIsoLimit {r t : Cone F} (P : IsLimit r) (i : r ≅ t) : IsLimit t :=
IsLimit.mkConeMorphism (fun s => P.liftConeMorphism s ≫ i.hom) fun s m => by
rw [← i.comp_inv_eq]; apply P.uniq_cone_morphism
@[simp]
theorem ofIsoLimit_lift {r t : Cone F} (P : IsLimit r) (i : r ≅ t) (s) :
(P.ofIsoLimit i).lift s = P.lift s ≫ i.hom.hom :=
rfl
/-- Isomorphism of cones preserves whether or not they are limiting cones. -/
def equivIsoLimit {r t : Cone F} (i : r ≅ t) : IsLimit r ≃ IsLimit t where
toFun h := h.ofIsoLimit i
invFun h := h.ofIsoLimit i.symm
left_inv := by aesop_cat
right_inv := by aesop_cat
@[simp]
theorem equivIsoLimit_apply {r t : Cone F} (i : r ≅ t) (P : IsLimit r) :
equivIsoLimit i P = P.ofIsoLimit i :=
rfl
|
@[simp]
theorem equivIsoLimit_symm_apply {r t : Cone F} (i : r ≅ t) (P : IsLimit t) :
| Mathlib/CategoryTheory/Limits/IsLimit.lean | 171 | 173 |
/-
Copyright (c) 2017 Johannes Hölzl. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Johannes Hölzl, Mario Carneiro, Yury Kudryashov
-/
import Mathlib.Order.Minimal
import Mathlib.Order.Zorn
import Mathlib.Topology.ContinuousOn
/-!
# Irreducibility in topological spaces
## Main definitions
* `IrreducibleSpace`: a typeclass applying to topological spaces, stating that the space
is nonempty and does not admit a nontrivial pair of disjoint opens.
* `IsIrreducible`: for a nonempty set in a topological space, the property that the set is an
irreducible space in the subspace topology.
## On the definition of irreducible and connected sets/spaces
In informal mathematics, irreducible spaces are assumed to be nonempty.
We formalise the predicate without that assumption as `IsPreirreducible`.
In other words, the only difference is whether the empty space counts as irreducible.
There are good reasons to consider the empty space to be “too simple to be simple”
See also https://ncatlab.org/nlab/show/too+simple+to+be+simple,
and in particular
https://ncatlab.org/nlab/show/too+simple+to+be+simple#relationship_to_biased_definitions.
-/
open Set Topology
variable {X : Type*} {Y : Type*} [TopologicalSpace X] [TopologicalSpace Y] {s t : Set X}
section Preirreducible
/-- A preirreducible set `s` is one where there is no non-trivial pair of disjoint opens on `s`. -/
def IsPreirreducible (s : Set X) : Prop :=
∀ u v : Set X, IsOpen u → IsOpen v → (s ∩ u).Nonempty → (s ∩ v).Nonempty → (s ∩ (u ∩ v)).Nonempty
/-- An irreducible set `s` is one that is nonempty and
where there is no non-trivial pair of disjoint opens on `s`. -/
def IsIrreducible (s : Set X) : Prop :=
s.Nonempty ∧ IsPreirreducible s
theorem IsIrreducible.nonempty (h : IsIrreducible s) : s.Nonempty :=
h.1
theorem IsIrreducible.isPreirreducible (h : IsIrreducible s) : IsPreirreducible s :=
h.2
theorem isPreirreducible_empty : IsPreirreducible (∅ : Set X) := fun _ _ _ _ _ ⟨_, h1, _⟩ =>
h1.elim
theorem Set.Subsingleton.isPreirreducible (hs : s.Subsingleton) : IsPreirreducible s :=
fun _u _v _ _ ⟨_x, hxs, hxu⟩ ⟨y, hys, hyv⟩ => ⟨y, hys, hs hxs hys ▸ hxu, hyv⟩
theorem isPreirreducible_singleton {x} : IsPreirreducible ({x} : Set X) :=
subsingleton_singleton.isPreirreducible
theorem isIrreducible_singleton {x} : IsIrreducible ({x} : Set X) :=
⟨singleton_nonempty x, isPreirreducible_singleton⟩
theorem isPreirreducible_iff_closure : IsPreirreducible (closure s) ↔ IsPreirreducible s :=
forall₄_congr fun u v hu hv => by
iterate 3 rw [closure_inter_open_nonempty_iff]
exacts [hu.inter hv, hv, hu]
theorem isIrreducible_iff_closure : IsIrreducible (closure s) ↔ IsIrreducible s :=
and_congr closure_nonempty_iff isPreirreducible_iff_closure
protected alias ⟨_, IsPreirreducible.closure⟩ := isPreirreducible_iff_closure
protected alias ⟨_, IsIrreducible.closure⟩ := isIrreducible_iff_closure
theorem exists_preirreducible (s : Set X) (H : IsPreirreducible s) :
∃ t : Set X, IsPreirreducible t ∧ s ⊆ t ∧ ∀ u, IsPreirreducible u → t ⊆ u → u = t :=
let ⟨m, hsm, hm⟩ :=
zorn_subset_nonempty { t : Set X | IsPreirreducible t }
(fun c hc hcc _ =>
⟨⋃₀ c, fun u v hu hv ⟨y, hy, hyu⟩ ⟨x, hx, hxv⟩ =>
let ⟨p, hpc, hyp⟩ := mem_sUnion.1 hy
let ⟨q, hqc, hxq⟩ := mem_sUnion.1 hx
Or.casesOn (hcc.total hpc hqc)
(fun hpq : p ⊆ q =>
let ⟨x, hxp, hxuv⟩ := hc hqc u v hu hv ⟨y, hpq hyp, hyu⟩ ⟨x, hxq, hxv⟩
⟨x, mem_sUnion_of_mem hxp hqc, hxuv⟩)
fun hqp : q ⊆ p =>
let ⟨x, hxp, hxuv⟩ := hc hpc u v hu hv ⟨y, hyp, hyu⟩ ⟨x, hqp hxq, hxv⟩
⟨x, mem_sUnion_of_mem hxp hpc, hxuv⟩,
fun _ hxc => subset_sUnion_of_mem hxc⟩)
s H
⟨m, hm.prop, hsm, fun _u hu hmu => (hm.eq_of_subset hu hmu).symm⟩
/-- The set of irreducible components of a topological space. -/
def irreducibleComponents (X : Type*) [TopologicalSpace X] : Set (Set X) :=
{s | Maximal IsIrreducible s}
theorem isClosed_of_mem_irreducibleComponents (s) (H : s ∈ irreducibleComponents X) :
IsClosed s := by
rw [← closure_eq_iff_isClosed, eq_comm]
exact subset_closure.antisymm (H.2 H.1.closure subset_closure)
theorem irreducibleComponents_eq_maximals_closed (X : Type*) [TopologicalSpace X] :
irreducibleComponents X = { s | Maximal (fun x ↦ IsClosed x ∧ IsIrreducible x) s} := by
ext s
constructor
· intro H
exact ⟨⟨isClosed_of_mem_irreducibleComponents _ H, H.1⟩, fun x h e => H.2 h.2 e⟩
· intro H
refine ⟨H.1.2, fun x h e => ?_⟩
have : closure x ≤ s := H.2 ⟨isClosed_closure, h.closure⟩ (e.trans subset_closure)
exact le_trans subset_closure this
/-- A maximal irreducible set that contains a given point. -/
def irreducibleComponent (x : X) : Set X :=
Classical.choose (exists_preirreducible {x} isPreirreducible_singleton)
theorem irreducibleComponent_property (x : X) :
IsPreirreducible (irreducibleComponent x) ∧
{x} ⊆ irreducibleComponent x ∧
∀ u, IsPreirreducible u → irreducibleComponent x ⊆ u → u = irreducibleComponent x :=
Classical.choose_spec (exists_preirreducible {x} isPreirreducible_singleton)
theorem mem_irreducibleComponent {x : X} : x ∈ irreducibleComponent x :=
singleton_subset_iff.1 (irreducibleComponent_property x).2.1
theorem isIrreducible_irreducibleComponent {x : X} : IsIrreducible (irreducibleComponent x) :=
⟨⟨x, mem_irreducibleComponent⟩, (irreducibleComponent_property x).1⟩
theorem eq_irreducibleComponent {x : X} :
IsPreirreducible s → irreducibleComponent x ⊆ s → s = irreducibleComponent x :=
(irreducibleComponent_property x).2.2 _
theorem irreducibleComponent_mem_irreducibleComponents (x : X) :
irreducibleComponent x ∈ irreducibleComponents X :=
⟨isIrreducible_irreducibleComponent, fun _ h₁ h₂ => (eq_irreducibleComponent h₁.2 h₂).le⟩
theorem isClosed_irreducibleComponent {x : X} : IsClosed (irreducibleComponent x) :=
isClosed_of_mem_irreducibleComponents _ (irreducibleComponent_mem_irreducibleComponents x)
/-- A preirreducible space is one where there is no non-trivial pair of disjoint opens. -/
class PreirreducibleSpace (X : Type*) [TopologicalSpace X] : Prop where
/-- In a preirreducible space, `Set.univ` is a preirreducible set. -/
isPreirreducible_univ : IsPreirreducible (univ : Set X)
/-- An irreducible space is one that is nonempty
and where there is no non-trivial pair of disjoint opens. -/
class IrreducibleSpace (X : Type*) [TopologicalSpace X] : Prop extends PreirreducibleSpace X where
toNonempty : Nonempty X
-- see Note [lower instance priority]
attribute [instance 50] IrreducibleSpace.toNonempty
theorem IrreducibleSpace.isIrreducible_univ (X : Type*) [TopologicalSpace X] [IrreducibleSpace X] :
IsIrreducible (univ : Set X) :=
⟨univ_nonempty, PreirreducibleSpace.isPreirreducible_univ⟩
theorem irreducibleSpace_def (X : Type*) [TopologicalSpace X] :
IrreducibleSpace X ↔ IsIrreducible (⊤ : Set X) :=
⟨@IrreducibleSpace.isIrreducible_univ X _, fun h =>
haveI : PreirreducibleSpace X := ⟨h.2⟩
⟨⟨h.1.some⟩⟩⟩
theorem nonempty_preirreducible_inter [PreirreducibleSpace X] :
IsOpen s → IsOpen t → s.Nonempty → t.Nonempty → (s ∩ t).Nonempty := by
simpa only [univ_inter, univ_subset_iff] using
@PreirreducibleSpace.isPreirreducible_univ X _ _ s t
/-- In a (pre)irreducible space, a nonempty open set is dense. -/
protected theorem IsOpen.dense [PreirreducibleSpace X] (ho : IsOpen s) (hne : s.Nonempty) :
Dense s :=
dense_iff_inter_open.2 fun _t hto htne => nonempty_preirreducible_inter hto ho htne hne
theorem IsPreirreducible.image (H : IsPreirreducible s) (f : X → Y) (hf : ContinuousOn f s) :
IsPreirreducible (f '' s) := by
rintro u v hu hv ⟨_, ⟨⟨x, hx, rfl⟩, hxu⟩⟩ ⟨_, ⟨⟨y, hy, rfl⟩, hyv⟩⟩
rw [← mem_preimage] at hxu hyv
rcases continuousOn_iff'.1 hf u hu with ⟨u', hu', u'_eq⟩
rcases continuousOn_iff'.1 hf v hv with ⟨v', hv', v'_eq⟩
have := H u' v' hu' hv'
rw [inter_comm s u', ← u'_eq] at this
rw [inter_comm s v', ← v'_eq] at this
rcases this ⟨x, hxu, hx⟩ ⟨y, hyv, hy⟩ with ⟨x, hxs, hxu', hxv'⟩
refine ⟨f x, mem_image_of_mem f hxs, ?_, ?_⟩
all_goals
rw [← mem_preimage]
apply mem_of_mem_inter_left
show x ∈ _ ∩ s
simp [*]
theorem IsIrreducible.image (H : IsIrreducible s) (f : X → Y) (hf : ContinuousOn f s) :
IsIrreducible (f '' s) :=
⟨H.nonempty.image _, H.isPreirreducible.image f hf⟩
theorem Subtype.preirreducibleSpace (h : IsPreirreducible s) : PreirreducibleSpace s where
isPreirreducible_univ := by
rintro _ _ ⟨u, hu, rfl⟩ ⟨v, hv, rfl⟩ ⟨⟨x, hxs⟩, -, hxu⟩ ⟨⟨y, hys⟩, -, hyv⟩
rcases h u v hu hv ⟨x, hxs, hxu⟩ ⟨y, hys, hyv⟩ with ⟨x, hxs, ⟨hxu, hxv⟩⟩
exact ⟨⟨x, hxs⟩, ⟨Set.mem_univ _, ⟨hxu, hxv⟩⟩⟩
theorem Subtype.irreducibleSpace (h : IsIrreducible s) : IrreducibleSpace s where
isPreirreducible_univ :=
(Subtype.preirreducibleSpace h.isPreirreducible).isPreirreducible_univ
toNonempty := h.nonempty.to_subtype
/-- An infinite type with cofinite topology is an irreducible topological space. -/
instance (priority := 100) {X} [Infinite X] : IrreducibleSpace (CofiniteTopology X) where
isPreirreducible_univ u v := by
haveI : Infinite (CofiniteTopology X) := ‹_›
simp only [CofiniteTopology.isOpen_iff, univ_inter]
intro hu hv hu' hv'
simpa only [compl_union, compl_compl] using ((hu hu').union (hv hv')).infinite_compl.nonempty
toNonempty := (inferInstance : Nonempty X)
theorem irreducibleComponents_eq_singleton [IrreducibleSpace X] :
irreducibleComponents X = {univ} :=
Set.ext fun _ ↦ IsGreatest.maximal_iff (s := IsIrreducible (X := X))
⟨IrreducibleSpace.isIrreducible_univ X, fun _ _ ↦ Set.subset_univ _⟩
/-- A set `s` is irreducible if and only if
for every finite collection of open sets all of whose members intersect `s`,
`s` also intersects the intersection of the entire collection
(i.e., there is an element of `s` contained in every member of the collection). -/
theorem isIrreducible_iff_sInter :
IsIrreducible s ↔
∀ (U : Finset (Set X)), (∀ u ∈ U, IsOpen u) → (∀ u ∈ U, (s ∩ u).Nonempty) →
(s ∩ ⋂₀ ↑U).Nonempty := by
classical
refine ⟨fun h U hu hU => ?_, fun h => ⟨?_, ?_⟩⟩
· induction U using Finset.induction_on with
| empty => simpa using h.nonempty
| insert u U _ IH =>
rw [Finset.coe_insert, sInter_insert]
rw [Finset.forall_mem_insert] at hu hU
exact h.2 _ _ hu.1 (U.finite_toSet.isOpen_sInter hu.2) hU.1 (IH hu.2 hU.2)
· simpa using h ∅
· intro u v hu hv hu' hv'
simpa [*] using h {u, v}
/-- A set is preirreducible if and only if
for every cover by two closed sets, it is contained in one of the two covering sets. -/
theorem isPreirreducible_iff_isClosed_union_isClosed :
IsPreirreducible s ↔
∀ z₁ z₂ : Set X, IsClosed z₁ → IsClosed z₂ → s ⊆ z₁ ∪ z₂ → s ⊆ z₁ ∨ s ⊆ z₂ := by
refine compl_surjective.forall.trans <| forall_congr' fun z₁ => compl_surjective.forall.trans <|
forall_congr' fun z₂ => ?_
simp only [isOpen_compl_iff, ← compl_union, inter_compl_nonempty_iff]
refine forall₂_congr fun _ _ => ?_
rw [← and_imp, ← not_or, not_imp_not]
@[deprecated (since := "2024-11-19")] alias
isPreirreducible_iff_closed_union_closed := isPreirreducible_iff_isClosed_union_isClosed
/-- A set is irreducible if and only if for every cover by a finite collection of closed sets, it is
contained in one of the members of the collection. -/
theorem isIrreducible_iff_sUnion_isClosed :
IsIrreducible s ↔
∀ t : Finset (Set X), (∀ z ∈ t, IsClosed z) → (s ⊆ ⋃₀ ↑t) → ∃ z ∈ t, s ⊆ z := by
simp only [isIrreducible_iff_sInter]
refine ((@compl_involutive (Set X) _).toPerm _).finsetCongr.forall_congr fun {t} => ?_
simp_rw [Equiv.finsetCongr_apply, Finset.forall_mem_map, Finset.mem_map, Finset.coe_map,
sUnion_image, Equiv.coe_toEmbedding, Function.Involutive.coe_toPerm, isClosed_compl_iff,
exists_exists_and_eq_and]
refine forall_congr' fun _ => Iff.trans ?_ not_imp_not
simp only [not_exists, not_and, ← compl_iInter₂, ← sInter_eq_biInter,
subset_compl_iff_disjoint_right, not_disjoint_iff_nonempty_inter]
@[deprecated (since := "2024-11-19")] alias
isIrreducible_iff_sUnion_closed := isIrreducible_iff_sUnion_isClosed
/-- A nonempty open subset of a preirreducible subspace is dense in the subspace. -/
theorem subset_closure_inter_of_isPreirreducible_of_isOpen {S U : Set X} (hS : IsPreirreducible S)
(hU : IsOpen U) (h : (S ∩ U).Nonempty) : S ⊆ closure (S ∩ U) := by
by_contra h'
obtain ⟨x, h₁, h₂, h₃⟩ :=
hS _ (closure (S ∩ U))ᶜ hU isClosed_closure.isOpen_compl h (inter_compl_nonempty_iff.mpr h')
exact h₃ (subset_closure ⟨h₁, h₂⟩)
/-- If `∅ ≠ U ⊆ S ⊆ t` such that `U` is open and `t` is preirreducible, then `S` is irreducible. -/
theorem IsPreirreducible.subset_irreducible {S U : Set X} (ht : IsPreirreducible t)
(hU : U.Nonempty) (hU' : IsOpen U) (h₁ : U ⊆ S) (h₂ : S ⊆ t) : IsIrreducible S := by
obtain ⟨z, hz⟩ := hU
replace ht : IsIrreducible t := ⟨⟨z, h₂ (h₁ hz)⟩, ht⟩
refine ⟨⟨z, h₁ hz⟩, ?_⟩
rintro u v hu hv ⟨x, hx, hx'⟩ ⟨y, hy, hy'⟩
classical
obtain ⟨x, -, hx'⟩ : Set.Nonempty (t ∩ ⋂₀ ↑({U, u, v} : Finset (Set X))) := by
refine isIrreducible_iff_sInter.mp ht {U, u, v} ?_ ?_
· simp [*]
· intro U H
simp only [Finset.mem_insert, Finset.mem_singleton] at H
rcases H with (rfl | rfl | rfl)
exacts [⟨z, h₂ (h₁ hz), hz⟩, ⟨x, h₂ hx, hx'⟩, ⟨y, h₂ hy, hy'⟩]
replace hx' : x ∈ U ∧ x ∈ u ∧ x ∈ v := by simpa using hx'
exact ⟨x, h₁ hx'.1, hx'.2⟩
theorem IsPreirreducible.open_subset {U : Set X} (ht : IsPreirreducible t) (hU : IsOpen U)
(hU' : U ⊆ t) : IsPreirreducible U :=
U.eq_empty_or_nonempty.elim (fun h => h.symm ▸ isPreirreducible_empty) fun h =>
(ht.subset_irreducible h hU (fun _ => id) hU').2
theorem IsPreirreducible.interior (ht : IsPreirreducible t) : IsPreirreducible (interior t) :=
ht.open_subset isOpen_interior interior_subset
|
theorem IsPreirreducible.preimage (ht : IsPreirreducible t) {f : Y → X}
(hf : IsOpenEmbedding f) : IsPreirreducible (f ⁻¹' t) := by
rintro U V hU hV ⟨x, hx, hx'⟩ ⟨y, hy, hy'⟩
obtain ⟨_, h₁, ⟨y, h₂, rfl⟩, ⟨y', h₃, h₄⟩⟩ :=
ht _ _ (hf.isOpenMap _ hU) (hf.isOpenMap _ hV) ⟨f x, hx, Set.mem_image_of_mem f hx'⟩
⟨f y, hy, Set.mem_image_of_mem f hy'⟩
cases hf.injective h₄
exact ⟨y, h₁, h₂, h₃⟩
end Preirreducible
| Mathlib/Topology/Irreducible.lean | 304 | 318 |
/-
Copyright (c) 2022 Anand Rao, Rémi Bottinelli. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Anand Rao, Rémi Bottinelli
-/
import Mathlib.CategoryTheory.CofilteredSystem
import Mathlib.Combinatorics.SimpleGraph.Path
import Mathlib.Data.Finite.Set
/-!
# Ends
This file contains a definition of the ends of a simple graph, as sections of the inverse system
assigning, to each finite set of vertices, the connected components of its complement.
-/
universe u
variable {V : Type u} (G : SimpleGraph V) (K L M : Set V)
namespace SimpleGraph
/-- The components outside a given set of vertices `K` -/
abbrev ComponentCompl :=
(G.induce Kᶜ).ConnectedComponent
variable {G} {K L M}
/-- The connected component of `v` in `G.induce Kᶜ`. -/
abbrev componentComplMk (G : SimpleGraph V) {v : V} (vK : v ∉ K) : G.ComponentCompl K :=
connectedComponentMk (G.induce Kᶜ) ⟨v, vK⟩
/-- The set of vertices of `G` making up the connected component `C` -/
def ComponentCompl.supp (C : G.ComponentCompl K) : Set V :=
{ v : V | ∃ h : v ∉ K, G.componentComplMk h = C }
@[ext]
theorem ComponentCompl.supp_injective :
Function.Injective (ComponentCompl.supp : G.ComponentCompl K → Set V) := by
refine ConnectedComponent.ind₂ ?_
rintro ⟨v, hv⟩ ⟨w, hw⟩ h
simp only [Set.ext_iff, ConnectedComponent.eq, Set.mem_setOf_eq, ComponentCompl.supp] at h ⊢
exact ((h v).mp ⟨hv, Reachable.refl _⟩).choose_spec
theorem ComponentCompl.supp_inj {C D : G.ComponentCompl K} : C.supp = D.supp ↔ C = D :=
ComponentCompl.supp_injective.eq_iff
instance ComponentCompl.setLike : SetLike (G.ComponentCompl K) V where
coe := ComponentCompl.supp
coe_injective' _ _ := ComponentCompl.supp_inj.mp
@[simp]
theorem ComponentCompl.mem_supp_iff {v : V} {C : ComponentCompl G K} :
v ∈ C ↔ ∃ vK : v ∉ K, G.componentComplMk vK = C :=
Iff.rfl
theorem componentComplMk_mem (G : SimpleGraph V) {v : V} (vK : v ∉ K) : v ∈ G.componentComplMk vK :=
⟨vK, rfl⟩
theorem componentComplMk_eq_of_adj (G : SimpleGraph V) {v w : V} (vK : v ∉ K) (wK : w ∉ K)
(a : G.Adj v w) : G.componentComplMk vK = G.componentComplMk wK := by
rw [ConnectedComponent.eq]
apply Adj.reachable
exact a
/-- In an infinite graph, the set of components out of a finite set is nonempty. -/
instance componentCompl_nonempty_of_infinite (G : SimpleGraph V) [Infinite V] (K : Finset V) :
Nonempty (G.ComponentCompl K) :=
let ⟨_, kK⟩ := K.finite_toSet.infinite_compl.nonempty
⟨componentComplMk _ kK⟩
namespace ComponentCompl
/-- A `ComponentCompl` specialization of `Quot.lift`, where soundness has to be proved only
for adjacent vertices.
-/
protected def lift {β : Sort*} (f : ∀ ⦃v⦄ (_ : v ∉ K), β)
(h : ∀ ⦃v w⦄ (hv : v ∉ K) (hw : w ∉ K), G.Adj v w → f hv = f hw) : G.ComponentCompl K → β :=
ConnectedComponent.lift (fun vv => f vv.prop) fun v w p => by
induction p with
| nil => rintro _; rfl
| cons a q ih => rename_i u v w; rintro h'; exact (h u.prop v.prop a).trans (ih h'.of_cons)
@[elab_as_elim]
protected theorem ind {β : G.ComponentCompl K → Prop}
(f : ∀ ⦃v⦄ (hv : v ∉ K), β (G.componentComplMk hv)) : ∀ C : G.ComponentCompl K, β C := by
apply ConnectedComponent.ind
exact fun ⟨v, vnK⟩ => f vnK
/-- The induced graph on the vertices `C`. -/
protected abbrev coeGraph (C : ComponentCompl G K) : SimpleGraph C :=
G.induce (C : Set V)
theorem coe_inj {C D : G.ComponentCompl K} : (C : Set V) = (D : Set V) ↔ C = D :=
SetLike.coe_set_eq
@[simp]
protected theorem nonempty (C : G.ComponentCompl K) : (C : Set V).Nonempty :=
C.ind fun v vnK => ⟨v, vnK, rfl⟩
protected theorem exists_eq_mk (C : G.ComponentCompl K) :
∃ (v : _) (h : v ∉ K), G.componentComplMk h = C :=
C.nonempty
protected theorem disjoint_right (C : G.ComponentCompl K) : Disjoint K C := by
rw [Set.disjoint_iff]
exact fun v ⟨vK, vC⟩ => vC.choose vK
theorem not_mem_of_mem {C : G.ComponentCompl K} {c : V} (cC : c ∈ C) : c ∉ K := fun cK =>
Set.disjoint_iff.mp C.disjoint_right ⟨cK, cC⟩
protected theorem pairwise_disjoint :
Pairwise fun C D : G.ComponentCompl K => Disjoint (C : Set V) (D : Set V) := by
rintro C D ne
rw [Set.disjoint_iff]
exact fun u ⟨uC, uD⟩ => ne (uC.choose_spec.symm.trans uD.choose_spec)
/-- Any vertex adjacent to a vertex of `C` and not lying in `K` must lie in `C`.
-/
theorem mem_of_adj : ∀ {C : G.ComponentCompl K} (c d : V), c ∈ C → d ∉ K → G.Adj c d → d ∈ C :=
fun {C} c d ⟨cnK, h⟩ dnK cd =>
⟨dnK, by
rw [← h, ConnectedComponent.eq]
exact Adj.reachable cd.symm⟩
/--
Assuming `G` is preconnected and `K` not empty, given any connected component `C` outside of `K`,
there exists a vertex `k ∈ K` adjacent to a vertex `v ∈ C`.
-/
theorem exists_adj_boundary_pair (Gc : G.Preconnected) (hK : K.Nonempty) :
∀ C : G.ComponentCompl K, ∃ ck : V × V, ck.1 ∈ C ∧ ck.2 ∈ K ∧ G.Adj ck.1 ck.2 := by
refine ComponentCompl.ind fun v vnK => ?_
let C : G.ComponentCompl K := G.componentComplMk vnK
let dis := Set.disjoint_iff.mp C.disjoint_right
by_contra! h
suffices Set.univ = (C : Set V) by exact dis ⟨hK.choose_spec, this ▸ Set.mem_univ hK.some⟩
symm
rw [Set.eq_univ_iff_forall]
rintro u
by_contra unC
obtain ⟨p⟩ := Gc v u
obtain ⟨⟨⟨x, y⟩, xy⟩, -, xC, ynC⟩ :=
p.exists_boundary_dart (C : Set V) (G.componentComplMk_mem vnK) unC
exact ynC (mem_of_adj x y xC (fun yK : y ∈ K => h ⟨x, y⟩ xC yK xy) xy)
/--
If `K ⊆ L`, the components outside of `L` are all contained in a single component outside of `K`.
-/
abbrev hom (h : K ⊆ L) (C : G.ComponentCompl L) : G.ComponentCompl K :=
C.map <| induceHom Hom.id <| Set.compl_subset_compl.2 h
theorem subset_hom (C : G.ComponentCompl L) (h : K ⊆ L) : (C : Set V) ⊆ (C.hom h : Set V) := by
rintro c ⟨cL, rfl⟩
exact ⟨fun h' => cL (h h'), rfl⟩
theorem _root_.SimpleGraph.componentComplMk_mem_hom
(G : SimpleGraph V) {v : V} (vK : v ∉ K) (h : L ⊆ K) :
v ∈ (G.componentComplMk vK).hom h :=
subset_hom (G.componentComplMk vK) h (G.componentComplMk_mem vK)
theorem hom_eq_iff_le (C : G.ComponentCompl L) (h : K ⊆ L) (D : G.ComponentCompl K) :
C.hom h = D ↔ (C : Set V) ⊆ (D : Set V) :=
⟨fun h' => h' ▸ C.subset_hom h, C.ind fun _ vnL vD => (vD ⟨vnL, rfl⟩).choose_spec⟩
theorem hom_eq_iff_not_disjoint (C : G.ComponentCompl L) (h : K ⊆ L) (D : G.ComponentCompl K) :
C.hom h = D ↔ ¬Disjoint (C : Set V) (D : Set V) := by
rw [Set.not_disjoint_iff]
constructor
· rintro rfl
refine C.ind fun x xnL => ?_
exact ⟨x, ⟨xnL, rfl⟩, ⟨fun xK => xnL (h xK), rfl⟩⟩
· refine C.ind fun x xnL => ?_
rintro ⟨x, ⟨_, e₁⟩, _, rfl⟩
rw [← e₁]
rfl
theorem hom_refl (C : G.ComponentCompl L) : C.hom (subset_refl L) = C := by
change C.map _ = C
rw [induceHom_id G Lᶜ, ConnectedComponent.map_id]
theorem hom_trans (C : G.ComponentCompl L) (h : K ⊆ L) (h' : M ⊆ K) :
C.hom (h'.trans h) = (C.hom h).hom h' := by
change C.map _ = (C.map _).map _
rw [ConnectedComponent.map_comp, induceHom_comp]
rfl
theorem hom_mk {v : V} (vnL : v ∉ L) (h : K ⊆ L) :
(G.componentComplMk vnL).hom h = G.componentComplMk (Set.not_mem_subset h vnL) :=
rfl
theorem hom_infinite (C : G.ComponentCompl L) (h : K ⊆ L) (Cinf : (C : Set V).Infinite) :
(C.hom h : Set V).Infinite :=
Set.Infinite.mono (C.subset_hom h) Cinf
theorem infinite_iff_in_all_ranges {K : Finset V} (C : G.ComponentCompl K) :
C.supp.Infinite ↔ ∀ (L) (h : K ⊆ L), ∃ D : G.ComponentCompl L, D.hom h = C := by
classical
constructor
· rintro Cinf L h
obtain ⟨v, ⟨vK, rfl⟩, vL⟩ := Set.Infinite.nonempty (Set.Infinite.diff Cinf L.finite_toSet)
exact ⟨componentComplMk _ vL, rfl⟩
· rintro h Cfin
obtain ⟨D, e⟩ := h (K ∪ Cfin.toFinset) Finset.subset_union_left
obtain ⟨v, vD⟩ := D.nonempty
let Ddis := D.disjoint_right
simp_rw [Finset.coe_union, Set.Finite.coe_toFinset, Set.disjoint_union_left,
Set.disjoint_iff] at Ddis
exact Ddis.right ⟨(ComponentCompl.hom_eq_iff_le _ _ _).mp e vD, vD⟩
end ComponentCompl
/-- For a locally finite preconnected graph, the number of components outside of any finite set
is finite. -/
instance componentCompl_finite [LocallyFinite G] [Gpc : Fact G.Preconnected] (K : Finset V) :
Finite (G.ComponentCompl K) := by
classical
rcases K.eq_empty_or_nonempty with rfl | h
-- If K is empty, then removing K doesn't change the graph, which is connected, hence has a
-- single connected component
· dsimp [ComponentCompl]
rw [Finset.coe_empty, Set.compl_empty]
have := Gpc.out.subsingleton_connectedComponent
exact Finite.of_equiv _ (induceUnivIso G).connectedComponentEquiv.symm
-- Otherwise, we consider the function `touch` mapping a connected component to one of its
-- vertices adjacent to `K`.
· let touch (C : G.ComponentCompl K) : {v : V | ∃ k : V, k ∈ K ∧ G.Adj k v} :=
let p := C.exists_adj_boundary_pair Gpc.out h
⟨p.choose.1, p.choose.2, p.choose_spec.2.1, p.choose_spec.2.2.symm⟩
-- `touch` is injective
have touch_inj : touch.Injective := fun C D h' => ComponentCompl.pairwise_disjoint.eq
(Set.not_disjoint_iff.mpr ⟨touch C, (C.exists_adj_boundary_pair Gpc.out h).choose_spec.1,
h'.symm ▸ (D.exists_adj_boundary_pair Gpc.out h).choose_spec.1⟩)
-- `touch` has finite range
have : Finite (Set.range touch) := by
refine @Subtype.finite _ (Set.Finite.to_subtype ?_) _
apply Set.Finite.ofFinset (K.biUnion (fun v => G.neighborFinset v))
simp only [Finset.mem_biUnion, mem_neighborFinset, Set.mem_setOf_eq, implies_true]
-- hence `touch` has a finite domain
apply Finite.of_injective_finite_range touch_inj
section Ends
variable (G)
open CategoryTheory
/--
The functor assigning, to a finite set in `V`, the set of connected components in its complement.
-/
@[simps]
def componentComplFunctor : (Finset V)ᵒᵖ ⥤ Type u where
obj K := G.ComponentCompl K.unop
map f := ComponentCompl.hom (le_of_op_hom f)
map_id _ := funext fun C => C.hom_refl
map_comp {_ Y Z} h h' := funext fun C => by
convert C.hom_trans (le_of_op_hom h) (le_of_op_hom _)
exact h'
/-- The end of a graph, defined as the sections of the functor `component_compl_functor` . -/
protected def «end» :=
(componentComplFunctor G).sections
theorem end_hom_mk_of_mk {s} (sec : s ∈ G.end) {K L : (Finset V)ᵒᵖ} (h : L ⟶ K) {v : V}
(vnL : v ∉ L.unop) (hs : s L = G.componentComplMk vnL) :
s K = G.componentComplMk (Set.not_mem_subset (le_of_op_hom h : _ ⊆ _) vnL) := by
rw [← sec h, hs]
apply ComponentCompl.hom_mk _ (le_of_op_hom h : _ ⊆ _)
theorem infinite_iff_in_eventualRange {K : (Finset V)ᵒᵖ} (C : G.componentComplFunctor.obj K) :
C.supp.Infinite ↔ C ∈ G.componentComplFunctor.eventualRange K := by
simp only [C.infinite_iff_in_all_ranges, CategoryTheory.Functor.eventualRange, Set.mem_iInter,
Set.mem_range, componentComplFunctor_map]
exact
⟨fun h Lop KL => h Lop.unop (le_of_op_hom KL), fun h L KL =>
h (Opposite.op L) (opHomOfLE KL)⟩
end Ends
end SimpleGraph
| Mathlib/Combinatorics/SimpleGraph/Ends/Defs.lean | 305 | 311 | |
/-
Copyright (c) 2020 Nicolò Cavalleri. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Nicolò Cavalleri, Andrew Yang
-/
import Mathlib.RingTheory.Derivation.ToSquareZero
import Mathlib.RingTheory.Ideal.Cotangent
import Mathlib.RingTheory.IsTensorProduct
import Mathlib.RingTheory.EssentialFiniteness
import Mathlib.Algebra.Exact
import Mathlib.LinearAlgebra.TensorProduct.RightExactness
/-!
# The module of kaehler differentials
## Main results
- `KaehlerDifferential`: The module of kaehler differentials. For an `R`-algebra `S`, we provide
the notation `Ω[S⁄R]` for `KaehlerDifferential R S`.
Note that the slash is `\textfractionsolidus`.
- `KaehlerDifferential.D`: The derivation into the module of kaehler differentials.
- `KaehlerDifferential.span_range_derivation`: The image of `D` spans `Ω[S⁄R]` as an `S`-module.
- `KaehlerDifferential.linearMapEquivDerivation`:
The isomorphism `Hom_R(Ω[S⁄R], M) ≃ₗ[S] Der_R(S, M)`.
- `KaehlerDifferential.quotKerTotalEquiv`: An alternative description of `Ω[S⁄R]` as `S` copies
of `S` with kernel (`KaehlerDifferential.kerTotal`) generated by the relations:
1. `dx + dy = d(x + y)`
2. `x dy + y dx = d(x * y)`
3. `dr = 0` for `r ∈ R`
- `KaehlerDifferential.map`: Given a map between the arrows `R →+* A` and `S →+* B`, we have an
`A`-linear map `Ω[A⁄R] → Ω[B⁄S]`.
- `KaehlerDifferential.map_surjective`:
The sequence `Ω[B⁄R] → Ω[B⁄A] → 0` is exact.
- `KaehlerDifferential.exact_mapBaseChange_map`:
The sequence `B ⊗[A] Ω[A⁄R] → Ω[B⁄R] → Ω[B⁄A]` is exact.
- `KaehlerDifferential.exact_kerCotangentToTensor_mapBaseChange`:
If `A → B` is surjective with kernel `I`, then
the sequence `I/I² → B ⊗[A] Ω[A⁄R] → Ω[B⁄R]` is exact.
- `KaehlerDifferential.mapBaseChange_surjective`:
If `A → B` is surjective, then the sequence `B ⊗[A] Ω[A⁄R] → Ω[B⁄R] → 0` is exact.
## Future project
- Define the `IsKaehlerDifferential` predicate.
-/
suppress_compilation
section KaehlerDifferential
open scoped TensorProduct
open Algebra Finsupp
universe u v
variable (R : Type u) (S : Type v) [CommRing R] [CommRing S] [Algebra R S]
/-- The kernel of the multiplication map `S ⊗[R] S →ₐ[R] S`. -/
abbrev KaehlerDifferential.ideal : Ideal (S ⊗[R] S) :=
RingHom.ker (TensorProduct.lmul' R : S ⊗[R] S →ₐ[R] S)
variable {S}
theorem KaehlerDifferential.one_smul_sub_smul_one_mem_ideal (a : S) :
(1 : S) ⊗ₜ[R] a - a ⊗ₜ[R] (1 : S) ∈ KaehlerDifferential.ideal R S := by simp [RingHom.mem_ker]
variable {R}
variable {M : Type*} [AddCommGroup M] [Module R M] [Module S M] [IsScalarTower R S M]
/-- For a `R`-derivation `S → M`, this is the map `S ⊗[R] S →ₗ[S] M` sending `s ⊗ₜ t ↦ s • D t`. -/
def Derivation.tensorProductTo (D : Derivation R S M) : S ⊗[R] S →ₗ[S] M :=
TensorProduct.AlgebraTensorModule.lift ((LinearMap.lsmul S (S →ₗ[R] M)).flip D.toLinearMap)
theorem Derivation.tensorProductTo_tmul (D : Derivation R S M) (s t : S) :
D.tensorProductTo (s ⊗ₜ t) = s • D t := rfl
theorem Derivation.tensorProductTo_mul (D : Derivation R S M) (x y : S ⊗[R] S) :
D.tensorProductTo (x * y) =
TensorProduct.lmul' (S := S) R x • D.tensorProductTo y +
TensorProduct.lmul' (S := S) R y • D.tensorProductTo x := by
refine TensorProduct.induction_on x ?_ ?_ ?_
· rw [zero_mul, map_zero, map_zero, zero_smul, smul_zero, add_zero]
swap
· intro x₁ y₁ h₁ h₂
rw [add_mul, map_add, map_add, map_add, add_smul, smul_add, h₁, h₂, add_add_add_comm]
intro x₁ x₂
refine TensorProduct.induction_on y ?_ ?_ ?_
· rw [mul_zero, map_zero, map_zero, zero_smul, smul_zero, add_zero]
swap
· intro x₁ y₁ h₁ h₂
rw [mul_add, map_add, map_add, map_add, add_smul, smul_add, h₁, h₂, add_add_add_comm]
intro x y
simp only [TensorProduct.tmul_mul_tmul, Derivation.tensorProductTo,
TensorProduct.AlgebraTensorModule.lift_apply, TensorProduct.lift.tmul',
TensorProduct.lmul'_apply_tmul]
dsimp
rw [D.leibniz]
simp only [smul_smul, smul_add, mul_comm (x * y) x₁, mul_right_comm x₁ x₂, ← mul_assoc]
variable (R S)
/-- The kernel of `S ⊗[R] S →ₐ[R] S` is generated by `1 ⊗ s - s ⊗ 1` as a `S`-module. -/
theorem KaehlerDifferential.submodule_span_range_eq_ideal :
Submodule.span S (Set.range fun s : S => (1 : S) ⊗ₜ[R] s - s ⊗ₜ[R] (1 : S)) =
(KaehlerDifferential.ideal R S).restrictScalars S := by
apply le_antisymm
· rw [Submodule.span_le]
rintro _ ⟨s, rfl⟩
exact KaehlerDifferential.one_smul_sub_smul_one_mem_ideal _ _
· rintro x (hx : _ = _)
have : x - TensorProduct.lmul' (S := S) R x ⊗ₜ[R] (1 : S) = x := by
rw [hx, TensorProduct.zero_tmul, sub_zero]
rw [← this]
clear this hx
refine TensorProduct.induction_on x ?_ ?_ ?_
· rw [map_zero, TensorProduct.zero_tmul, sub_zero]; exact zero_mem _
· intro x y
have : x ⊗ₜ[R] y - (x * y) ⊗ₜ[R] (1 : S) = x • ((1 : S) ⊗ₜ y - y ⊗ₜ (1 : S)) := by
simp_rw [smul_sub, TensorProduct.smul_tmul', smul_eq_mul, mul_one]
rw [TensorProduct.lmul'_apply_tmul, this]
refine Submodule.smul_mem _ x ?_
apply Submodule.subset_span
exact Set.mem_range_self y
· intro x y hx hy
rw [map_add, TensorProduct.add_tmul, ← sub_add_sub_comm]
exact add_mem hx hy
theorem KaehlerDifferential.span_range_eq_ideal :
Ideal.span (Set.range fun s : S => (1 : S) ⊗ₜ[R] s - s ⊗ₜ[R] (1 : S)) =
KaehlerDifferential.ideal R S := by
apply le_antisymm
· rw [Ideal.span_le]
rintro _ ⟨s, rfl⟩
exact KaehlerDifferential.one_smul_sub_smul_one_mem_ideal _ _
· change (KaehlerDifferential.ideal R S).restrictScalars S ≤ (Ideal.span _).restrictScalars S
rw [← KaehlerDifferential.submodule_span_range_eq_ideal, Ideal.span]
conv_rhs => rw [← Submodule.span_span_of_tower S]
exact Submodule.subset_span
/-- The module of Kähler differentials (Kahler differentials, Kaehler differentials).
This is implemented as `I / I ^ 2` with `I` the kernel of the multiplication map `S ⊗[R] S →ₐ[R] S`.
To view elements as a linear combination of the form `s • D s'`, use
`KaehlerDifferential.tensorProductTo_surjective` and `Derivation.tensorProductTo_tmul`.
We also provide the notation `Ω[S⁄R]` for `KaehlerDifferential R S`.
Note that the slash is `\textfractionsolidus`.
-/
def KaehlerDifferential : Type v :=
(KaehlerDifferential.ideal R S).Cotangent
instance : AddCommGroup (KaehlerDifferential R S) := inferInstanceAs <|
AddCommGroup (KaehlerDifferential.ideal R S).Cotangent
instance KaehlerDifferential.module : Module (S ⊗[R] S) (KaehlerDifferential R S) :=
Ideal.Cotangent.moduleOfTower _
@[inherit_doc KaehlerDifferential]
notation:100 "Ω[" S "⁄" R "]" => KaehlerDifferential R S
instance : Nonempty (Ω[S⁄R]) := ⟨0⟩
instance KaehlerDifferential.module' {R' : Type*} [CommRing R'] [Algebra R' S]
[SMulCommClass R R' S] :
Module R' (Ω[S⁄R]) :=
Submodule.Quotient.module' _
instance : IsScalarTower S (S ⊗[R] S) (Ω[S⁄R]) :=
Ideal.Cotangent.isScalarTower _
instance KaehlerDifferential.isScalarTower_of_tower {R₁ R₂ : Type*} [CommRing R₁] [CommRing R₂]
[Algebra R₁ S] [Algebra R₂ S] [SMul R₁ R₂]
[SMulCommClass R R₁ S] [SMulCommClass R R₂ S] [IsScalarTower R₁ R₂ S] :
IsScalarTower R₁ R₂ (Ω[S⁄R]) :=
Submodule.Quotient.isScalarTower _ _
instance KaehlerDifferential.isScalarTower' : IsScalarTower R (S ⊗[R] S) (Ω[S⁄R]) :=
Submodule.Quotient.isScalarTower _ _
/-- The quotient map `I → Ω[S⁄R]` with `I` being the kernel of `S ⊗[R] S → S`. -/
def KaehlerDifferential.fromIdeal : KaehlerDifferential.ideal R S →ₗ[S ⊗[R] S] Ω[S⁄R] :=
(KaehlerDifferential.ideal R S).toCotangent
/-- (Implementation) The underlying linear map of the derivation into `Ω[S⁄R]`. -/
def KaehlerDifferential.DLinearMap : S →ₗ[R] Ω[S⁄R] :=
((KaehlerDifferential.fromIdeal R S).restrictScalars R).comp
((TensorProduct.includeRight.toLinearMap - TensorProduct.includeLeft.toLinearMap :
S →ₗ[R] S ⊗[R] S).codRestrict
((KaehlerDifferential.ideal R S).restrictScalars R)
(KaehlerDifferential.one_smul_sub_smul_one_mem_ideal R) :
_ →ₗ[R] _)
theorem KaehlerDifferential.DLinearMap_apply (s : S) :
KaehlerDifferential.DLinearMap R S s =
(KaehlerDifferential.ideal R S).toCotangent
⟨1 ⊗ₜ s - s ⊗ₜ 1, KaehlerDifferential.one_smul_sub_smul_one_mem_ideal R s⟩ := rfl
/-- The universal derivation into `Ω[S⁄R]`. -/
def KaehlerDifferential.D : Derivation R S (Ω[S⁄R]) :=
{ toLinearMap := KaehlerDifferential.DLinearMap R S
map_one_eq_zero' := by
dsimp [KaehlerDifferential.DLinearMap_apply, Ideal.toCotangent_apply]
congr
rw [sub_self]
leibniz' := fun a b => by
have : LinearMap.CompatibleSMul { x // x ∈ ideal R S } (Ω[S⁄R]) S (S ⊗[R] S) := inferInstance
dsimp [KaehlerDifferential.DLinearMap_apply]
rw [← LinearMap.map_smul_of_tower (ideal R S).toCotangent,
← LinearMap.map_smul_of_tower (ideal R S).toCotangent,
← map_add (ideal R S).toCotangent, Ideal.toCotangent_eq, pow_two]
convert Submodule.mul_mem_mul (KaehlerDifferential.one_smul_sub_smul_one_mem_ideal R a :)
(KaehlerDifferential.one_smul_sub_smul_one_mem_ideal R b :) using 1
simp only [AddSubgroupClass.coe_sub, Submodule.coe_add, Submodule.coe_mk,
TensorProduct.tmul_mul_tmul, mul_sub, sub_mul, mul_comm b, Submodule.coe_smul_of_tower,
smul_sub, TensorProduct.smul_tmul', smul_eq_mul, mul_one]
ring_nf }
theorem KaehlerDifferential.D_apply (s : S) :
KaehlerDifferential.D R S s =
(KaehlerDifferential.ideal R S).toCotangent
⟨1 ⊗ₜ s - s ⊗ₜ 1, KaehlerDifferential.one_smul_sub_smul_one_mem_ideal R s⟩ := rfl
theorem KaehlerDifferential.span_range_derivation :
Submodule.span S (Set.range <| KaehlerDifferential.D R S) = ⊤ := by
rw [_root_.eq_top_iff]
rintro x -
obtain ⟨⟨x, hx⟩, rfl⟩ := Ideal.toCotangent_surjective _ x
have : x ∈ (KaehlerDifferential.ideal R S).restrictScalars S := hx
rw [← KaehlerDifferential.submodule_span_range_eq_ideal] at this
suffices ∃ hx, (KaehlerDifferential.ideal R S).toCotangent ⟨x, hx⟩ ∈
Submodule.span S (Set.range <| KaehlerDifferential.D R S) by
exact this.choose_spec
refine Submodule.span_induction ?_ ?_ ?_ ?_ this
· rintro _ ⟨x, rfl⟩
refine ⟨KaehlerDifferential.one_smul_sub_smul_one_mem_ideal R x, ?_⟩
apply Submodule.subset_span
exact ⟨x, KaehlerDifferential.DLinearMap_apply R S x⟩
· exact ⟨zero_mem _, Submodule.zero_mem _⟩
· rintro x y - - ⟨hx₁, hx₂⟩ ⟨hy₁, hy₂⟩; exact ⟨add_mem hx₁ hy₁, Submodule.add_mem _ hx₂ hy₂⟩
· rintro r x - ⟨hx₁, hx₂⟩
exact ⟨((KaehlerDifferential.ideal R S).restrictScalars S).smul_mem r hx₁,
Submodule.smul_mem _ r hx₂⟩
/-- `Ω[S⁄R]` is trivial if `R → S` is surjective.
Also see `Algebra.FormallyUnramified.iff_subsingleton_kaehlerDifferential`. -/
lemma KaehlerDifferential.subsingleton_of_surjective (h : Function.Surjective (algebraMap R S)) :
Subsingleton (Ω[S⁄R]) := by
suffices (⊤ : Submodule S (Ω[S⁄R])) ≤ ⊥ from
(subsingleton_iff_forall_eq 0).mpr fun y ↦ this trivial
rw [← KaehlerDifferential.span_range_derivation, Submodule.span_le]
rintro _ ⟨x, rfl⟩; obtain ⟨x, rfl⟩ := h x; simp
variable {R S}
/-- The linear map from `Ω[S⁄R]`, associated with a derivation. -/
def Derivation.liftKaehlerDifferential (D : Derivation R S M) : Ω[S⁄R] →ₗ[S] M := by
refine LinearMap.comp ((((KaehlerDifferential.ideal R S) •
(⊤ : Submodule (S ⊗[R] S) (KaehlerDifferential.ideal R S))).restrictScalars S).liftQ ?_ ?_)
(Submodule.Quotient.restrictScalarsEquiv S _).symm.toLinearMap
· exact D.tensorProductTo.comp ((KaehlerDifferential.ideal R S).subtype.restrictScalars S)
· intro x hx
rw [LinearMap.mem_ker]
refine Submodule.smul_induction_on ((Submodule.restrictScalars_mem _ _ _).mp hx) ?_ ?_
· rintro x hx y -
rw [RingHom.mem_ker] at hx
dsimp
rw [Derivation.tensorProductTo_mul, hx, y.prop, zero_smul, zero_smul, zero_add]
· intro x y ex ey; rw [map_add, ex, ey, zero_add]
theorem Derivation.liftKaehlerDifferential_apply (D : Derivation R S M) (x) :
D.liftKaehlerDifferential ((KaehlerDifferential.ideal R S).toCotangent x) =
D.tensorProductTo x := rfl
theorem Derivation.liftKaehlerDifferential_comp (D : Derivation R S M) :
D.liftKaehlerDifferential.compDer (KaehlerDifferential.D R S) = D := by
ext a
dsimp [KaehlerDifferential.D_apply]
refine (D.liftKaehlerDifferential_apply _).trans ?_
rw [Subtype.coe_mk, map_sub, Derivation.tensorProductTo_tmul, Derivation.tensorProductTo_tmul,
one_smul, D.map_one_eq_zero, smul_zero, sub_zero]
@[simp]
theorem Derivation.liftKaehlerDifferential_comp_D (D' : Derivation R S M) (x : S) :
D'.liftKaehlerDifferential (KaehlerDifferential.D R S x) = D' x :=
Derivation.congr_fun D'.liftKaehlerDifferential_comp x
@[ext]
theorem Derivation.liftKaehlerDifferential_unique (f f' : Ω[S⁄R] →ₗ[S] M)
(hf : f.compDer (KaehlerDifferential.D R S) = f'.compDer (KaehlerDifferential.D R S)) :
f = f' := by
apply LinearMap.ext
intro x
have : x ∈ Submodule.span S (Set.range <| KaehlerDifferential.D R S) := by
rw [KaehlerDifferential.span_range_derivation]; trivial
refine Submodule.span_induction ?_ ?_ ?_ ?_ this
· rintro _ ⟨x, rfl⟩; exact congr_arg (fun D : Derivation R S M => D x) hf
· rw [map_zero, map_zero]
· intro x y _ _ hx hy; rw [map_add, map_add, hx, hy]
· intro a x _ e; simp [e]
variable (R S)
theorem Derivation.liftKaehlerDifferential_D :
(KaehlerDifferential.D R S).liftKaehlerDifferential = LinearMap.id :=
Derivation.liftKaehlerDifferential_unique _ _
(KaehlerDifferential.D R S).liftKaehlerDifferential_comp
variable {R S}
theorem KaehlerDifferential.D_tensorProductTo (x : KaehlerDifferential.ideal R S) :
(KaehlerDifferential.D R S).tensorProductTo x =
(KaehlerDifferential.ideal R S).toCotangent x := by
rw [← Derivation.liftKaehlerDifferential_apply, Derivation.liftKaehlerDifferential_D]
rfl
variable (R S)
theorem KaehlerDifferential.tensorProductTo_surjective :
Function.Surjective (KaehlerDifferential.D R S).tensorProductTo := by
intro x; obtain ⟨x, rfl⟩ := (KaehlerDifferential.ideal R S).toCotangent_surjective x
exact ⟨x, KaehlerDifferential.D_tensorProductTo x⟩
/-- The `S`-linear maps from `Ω[S⁄R]` to `M` are (`S`-linearly) equivalent to `R`-derivations
from `S` to `M`. -/
@[simps! symm_apply apply_apply]
def KaehlerDifferential.linearMapEquivDerivation : (Ω[S⁄R] →ₗ[S] M) ≃ₗ[S] Derivation R S M :=
{ Derivation.llcomp.flip <| KaehlerDifferential.D R S with
invFun := Derivation.liftKaehlerDifferential
left_inv := fun _ =>
Derivation.liftKaehlerDifferential_unique _ _ (Derivation.liftKaehlerDifferential_comp _)
right_inv := Derivation.liftKaehlerDifferential_comp }
/-- The quotient ring of `S ⊗ S ⧸ J ^ 2` by `Ω[S⁄R]` is isomorphic to `S`. -/
def KaehlerDifferential.quotientCotangentIdealRingEquiv :
(S ⊗ S ⧸ KaehlerDifferential.ideal R S ^ 2) ⧸ (KaehlerDifferential.ideal R S).cotangentIdeal ≃+*
S := by
have : Function.RightInverse (TensorProduct.includeLeft (R := R) (S := R) (A := S) (B := S))
(↑(TensorProduct.lmul' R : S ⊗[R] S →ₐ[R] S) : S ⊗[R] S →+* S) := by
intro x; rw [AlgHom.coe_toRingHom, ← AlgHom.comp_apply, TensorProduct.lmul'_comp_includeLeft]
rfl
refine (Ideal.quotCotangent _).trans ?_
refine (Ideal.quotEquivOfEq ?_).trans (RingHom.quotientKerEquivOfRightInverse this)
ext; rfl
/-- The quotient ring of `S ⊗ S ⧸ J ^ 2` by `Ω[S⁄R]` is isomorphic to `S` as an `S`-algebra. -/
def KaehlerDifferential.quotientCotangentIdeal :
((S ⊗ S ⧸ KaehlerDifferential.ideal R S ^ 2) ⧸
(KaehlerDifferential.ideal R S).cotangentIdeal) ≃ₐ[S] S :=
{ KaehlerDifferential.quotientCotangentIdealRingEquiv R S with
commutes' := (KaehlerDifferential.quotientCotangentIdealRingEquiv R S).apply_symm_apply }
theorem KaehlerDifferential.End_equiv_aux (f : S →ₐ[R] S ⊗ S ⧸ KaehlerDifferential.ideal R S ^ 2) :
(Ideal.Quotient.mkₐ R (KaehlerDifferential.ideal R S).cotangentIdeal).comp f =
IsScalarTower.toAlgHom R S _ ↔
(TensorProduct.lmul' R : S ⊗[R] S →ₐ[R] S).kerSquareLift.comp f = AlgHom.id R S := by
rw [AlgHom.ext_iff, AlgHom.ext_iff]
apply forall_congr'
intro x
have e₁ : (TensorProduct.lmul' R : S ⊗[R] S →ₐ[R] S).kerSquareLift (f x) =
KaehlerDifferential.quotientCotangentIdealRingEquiv R S
(Ideal.Quotient.mk (KaehlerDifferential.ideal R S).cotangentIdeal <| f x) := by
generalize f x = y; obtain ⟨y, rfl⟩ := Ideal.Quotient.mk_surjective y; rfl
have e₂ :
x = KaehlerDifferential.quotientCotangentIdealRingEquiv R S (IsScalarTower.toAlgHom R S _ x) :=
(mul_one x).symm
constructor
· intro e
exact (e₁.trans (@RingEquiv.congr_arg _ _ _ _ _ _
(KaehlerDifferential.quotientCotangentIdealRingEquiv R S) _ _ e)).trans e₂.symm
· intro e; apply (KaehlerDifferential.quotientCotangentIdealRingEquiv R S).injective
exact e₁.symm.trans (e.trans e₂)
/- Note: Lean is slow to synthesize these instances (times out).
Without them the endEquivDerivation' and endEquivAuxEquiv both have significant timeouts.
In Mathlib 3, it was slow but not this slow. -/
/-- A shortcut instance to prevent timing out. Hopefully to be removed in the future. -/
local instance smul_SSmod_SSmod : SMul (S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2)
(S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2) := Mul.toSMul _
/-- A shortcut instance to prevent timing out. Hopefully to be removed in the future. -/
@[nolint defLemma]
local instance isScalarTower_S_right :
IsScalarTower S (S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2)
(S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2) := Ideal.Quotient.isScalarTower_right
/-- A shortcut instance to prevent timing out. Hopefully to be removed in the future. -/
@[nolint defLemma]
local instance isScalarTower_R_right :
IsScalarTower R (S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2)
(S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2) := Ideal.Quotient.isScalarTower_right
/-- A shortcut instance to prevent timing out. Hopefully to be removed in the future. -/
@[nolint defLemma]
local instance isScalarTower_SS_right : IsScalarTower (S ⊗[R] S)
(S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2) (S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2) :=
Ideal.Quotient.isScalarTower_right
/-- A shortcut instance to prevent timing out. Hopefully to be removed in the future. -/
local instance instS : Module S (KaehlerDifferential.ideal R S).cotangentIdeal :=
Submodule.module' _
/-- A shortcut instance to prevent timing out. Hopefully to be removed in the future. -/
local instance instR : Module R (KaehlerDifferential.ideal R S).cotangentIdeal :=
Submodule.module' _
/-- A shortcut instance to prevent timing out. Hopefully to be removed in the future. -/
local instance instSS : Module (S ⊗[R] S) (KaehlerDifferential.ideal R S).cotangentIdeal :=
Submodule.module' _
/-- Derivations into `Ω[S⁄R]` is equivalent to derivations
into `(KaehlerDifferential.ideal R S).cotangentIdeal`. -/
noncomputable def KaehlerDifferential.endEquivDerivation' :
Derivation R S (Ω[S⁄R]) ≃ₗ[R] Derivation R S (ideal R S).cotangentIdeal :=
LinearEquiv.compDer ((KaehlerDifferential.ideal R S).cotangentEquivIdeal.restrictScalars S)
/-- (Implementation) An `Equiv` version of `KaehlerDifferential.End_equiv_aux`.
Used in `KaehlerDifferential.endEquiv`. -/
def KaehlerDifferential.endEquivAuxEquiv :
{ f //
(Ideal.Quotient.mkₐ R (KaehlerDifferential.ideal R S).cotangentIdeal).comp f =
IsScalarTower.toAlgHom R S _ } ≃
{ f // (TensorProduct.lmul' R : S ⊗[R] S →ₐ[R] S).kerSquareLift.comp f = AlgHom.id R S } :=
(Equiv.refl _).subtypeEquiv (KaehlerDifferential.End_equiv_aux R S)
/--
The endomorphisms of `Ω[S⁄R]` corresponds to sections of the surjection `S ⊗[R] S ⧸ J ^ 2 →ₐ[R] S`,
with `J` being the kernel of the multiplication map `S ⊗[R] S →ₐ[R] S`.
-/
noncomputable def KaehlerDifferential.endEquiv :
Module.End S (Ω[S⁄R]) ≃
{ f // (TensorProduct.lmul' R : S ⊗[R] S →ₐ[R] S).kerSquareLift.comp f = AlgHom.id R S } :=
(KaehlerDifferential.linearMapEquivDerivation R S).toEquiv.trans <|
(KaehlerDifferential.endEquivDerivation' R S).toEquiv.trans <|
(derivationToSquareZeroEquivLift (KaehlerDifferential.ideal R S).cotangentIdeal
(KaehlerDifferential.ideal R S).cotangentIdeal_square).trans <|
KaehlerDifferential.endEquivAuxEquiv R S
section Finiteness
theorem KaehlerDifferential.ideal_fg [EssFiniteType R S] :
(KaehlerDifferential.ideal R S).FG := by
classical
use (EssFiniteType.finset R S).image (fun s ↦ (1 : S) ⊗ₜ[R] s - s ⊗ₜ[R] (1 : S))
apply le_antisymm
· rw [Finset.coe_image, Ideal.span_le]
rintro _ ⟨x, _, rfl⟩
exact KaehlerDifferential.one_smul_sub_smul_one_mem_ideal R x
· rw [← KaehlerDifferential.span_range_eq_ideal, Ideal.span_le]
rintro _ ⟨x, rfl⟩
let I : Ideal (S ⊗[R] S) := Ideal.span
((EssFiniteType.finset R S).image (fun s ↦ (1 : S) ⊗ₜ[R] s - s ⊗ₜ[R] (1 : S)))
show _ - _ ∈ I
have : (IsScalarTower.toAlgHom R (S ⊗[R] S) (S ⊗[R] S ⧸ I)).comp TensorProduct.includeRight =
(IsScalarTower.toAlgHom R (S ⊗[R] S) (S ⊗[R] S ⧸ I)).comp TensorProduct.includeLeft := by
apply EssFiniteType.algHom_ext
intro a ha
simp only [AlgHom.coe_comp, IsScalarTower.coe_toAlgHom', Ideal.Quotient.algebraMap_eq,
Function.comp_apply, TensorProduct.includeLeft_apply, TensorProduct.includeRight_apply,
Ideal.Quotient.mk_eq_mk_iff_sub_mem]
refine Ideal.subset_span ?_
simp only [Finset.coe_image, Set.mem_image, Finset.mem_coe]
exact ⟨a, ha, rfl⟩
simpa [Ideal.Quotient.mk_eq_mk_iff_sub_mem] using AlgHom.congr_fun this x
instance KaehlerDifferential.finite [EssFiniteType R S] :
Module.Finite S (Ω[S⁄R]) := by
classical
let s := (EssFiniteType.finset R S).image (fun s ↦ D R S s)
refine ⟨⟨s, top_le_iff.mp ?_⟩⟩
rw [← span_range_derivation, Submodule.span_le]
rintro _ ⟨x, rfl⟩
have : ∀ x ∈ adjoin R (EssFiniteType.finset R S).toSet,
.D _ _ x ∈ Submodule.span S s.toSet := by
intro x hx
refine adjoin_induction ?_ ?_ ?_ ?_ hx
· exact fun x hx ↦ Submodule.subset_span (Finset.mem_image_of_mem _ hx)
· simp
· exact fun x y _ _ hx hy ↦ (D R S).map_add x y ▸ add_mem hx hy
· intro x y _ _ hx hy
simp only [Derivation.leibniz]
exact add_mem (Submodule.smul_mem _ _ hy) (Submodule.smul_mem _ _ hx)
obtain ⟨t, ht, ht', hxt⟩ := (essFiniteType_cond_iff R S (EssFiniteType.finset R S)).mp
EssFiniteType.cond.choose_spec x
rw [show D R S x =
ht'.unit⁻¹ • (D R S (x * t) - x • D R S t) by simp [smul_smul, Units.smul_def]]
exact Submodule.smul_mem _ _ (sub_mem (this _ hxt) (Submodule.smul_mem _ _ (this _ ht)))
end Finiteness
section Presentation
open KaehlerDifferential (D)
open Finsupp (single)
/-- The `S`-submodule of `S →₀ S` (the direct sum of copies of `S` indexed by `S`) generated by
the relations:
1. `dx + dy = d(x + y)`
2. `x dy + y dx = d(x * y)`
3. `dr = 0` for `r ∈ R`
where `db` is the unit in the copy of `S` with index `b`.
This is the kernel of the surjection
`Finsupp.linearCombination S Ω[S⁄R] S (KaehlerDifferential.D R S)`.
See `KaehlerDifferential.kerTotal_eq` and `KaehlerDifferential.linearCombination_surjective`.
-/
noncomputable def KaehlerDifferential.kerTotal : Submodule S (S →₀ S) :=
Submodule.span S
(((Set.range fun x : S × S => single x.1 1 + single x.2 1 - single (x.1 + x.2) 1) ∪
Set.range fun x : S × S => single x.2 x.1 + single x.1 x.2 - single (x.1 * x.2) 1) ∪
Set.range fun x : R => single (algebraMap R S x) 1)
unsuppress_compilation in
-- Porting note: was `local notation x "𝖣" y => (KaehlerDifferential.kerTotal R S).mkQ (single y x)`
-- but not having `DFunLike.coe` leads to `kerTotal_mkQ_single_smul` failing.
local notation3 x "𝖣" y => DFunLike.coe (KaehlerDifferential.kerTotal R S).mkQ (single y x)
theorem KaehlerDifferential.kerTotal_mkQ_single_add (x y z) : (z𝖣x + y) = (z𝖣x) + z𝖣y := by
rw [← map_add, eq_comm, ← sub_eq_zero, ← map_sub (Submodule.mkQ (kerTotal R S)),
Submodule.mkQ_apply, Submodule.Quotient.mk_eq_zero]
simp_rw [← Finsupp.smul_single_one _ z, ← smul_add, ← smul_sub]
exact Submodule.smul_mem _ _ (Submodule.subset_span (Or.inl <| Or.inl <| ⟨⟨_, _⟩, rfl⟩))
theorem KaehlerDifferential.kerTotal_mkQ_single_mul (x y z) :
(z𝖣x * y) = ((z * x)𝖣y) + (z * y)𝖣x := by
rw [← map_add, eq_comm, ← sub_eq_zero, ← map_sub (Submodule.mkQ (kerTotal R S)),
Submodule.mkQ_apply, Submodule.Quotient.mk_eq_zero]
simp_rw [← Finsupp.smul_single_one _ z, ← @smul_eq_mul _ _ z, ← Finsupp.smul_single, ← smul_add,
← smul_sub]
exact Submodule.smul_mem _ _ (Submodule.subset_span (Or.inl <| Or.inr <| ⟨⟨_, _⟩, rfl⟩))
theorem KaehlerDifferential.kerTotal_mkQ_single_algebraMap (x y) : (y𝖣algebraMap R S x) = 0 := by
rw [Submodule.mkQ_apply, Submodule.Quotient.mk_eq_zero, ← Finsupp.smul_single_one _ y]
exact Submodule.smul_mem _ _ (Submodule.subset_span (Or.inr <| ⟨_, rfl⟩))
theorem KaehlerDifferential.kerTotal_mkQ_single_algebraMap_one (x) : (x𝖣1) = 0 := by
rw [← (algebraMap R S).map_one, KaehlerDifferential.kerTotal_mkQ_single_algebraMap]
theorem KaehlerDifferential.kerTotal_mkQ_single_smul (r : R) (x y) : (y𝖣r • x) = r • y𝖣x := by
letI : SMulZeroClass R S := inferInstance
rw [Algebra.smul_def, KaehlerDifferential.kerTotal_mkQ_single_mul,
KaehlerDifferential.kerTotal_mkQ_single_algebraMap, add_zero, ← LinearMap.map_smul_of_tower,
Finsupp.smul_single, mul_comm, Algebra.smul_def]
/-- The (universal) derivation into `(S →₀ S) ⧸ KaehlerDifferential.kerTotal R S`. -/
noncomputable def KaehlerDifferential.derivationQuotKerTotal :
Derivation R S ((S →₀ S) ⧸ KaehlerDifferential.kerTotal R S) where
toFun x := 1𝖣x
map_add' _ _ := KaehlerDifferential.kerTotal_mkQ_single_add _ _ _ _ _
map_smul' _ _ := KaehlerDifferential.kerTotal_mkQ_single_smul _ _ _ _ _
map_one_eq_zero' := KaehlerDifferential.kerTotal_mkQ_single_algebraMap_one _ _ _
leibniz' a b :=
(KaehlerDifferential.kerTotal_mkQ_single_mul _ _ _ _ _).trans
(by simp_rw [← Finsupp.smul_single_one _ (1 * _ : S)]; dsimp; simp)
theorem KaehlerDifferential.derivationQuotKerTotal_apply (x) :
KaehlerDifferential.derivationQuotKerTotal R S x = 1𝖣x :=
rfl
theorem KaehlerDifferential.derivationQuotKerTotal_lift_comp_linearCombination :
(KaehlerDifferential.derivationQuotKerTotal R S).liftKaehlerDifferential.comp
(Finsupp.linearCombination S (KaehlerDifferential.D R S)) =
Submodule.mkQ _ := by
apply Finsupp.lhom_ext
intro a b
conv_rhs => rw [← Finsupp.smul_single_one a b, LinearMap.map_smul]
simp [KaehlerDifferential.derivationQuotKerTotal_apply]
theorem KaehlerDifferential.kerTotal_eq :
LinearMap.ker (Finsupp.linearCombination S (KaehlerDifferential.D R S)) =
KaehlerDifferential.kerTotal R S := by
apply le_antisymm
· conv_rhs => rw [← (KaehlerDifferential.kerTotal R S).ker_mkQ]
rw [← KaehlerDifferential.derivationQuotKerTotal_lift_comp_linearCombination]
exact LinearMap.ker_le_ker_comp _ _
· rw [KaehlerDifferential.kerTotal, Submodule.span_le]
rintro _ ((⟨⟨x, y⟩, rfl⟩ | ⟨⟨x, y⟩, rfl⟩) | ⟨x, rfl⟩) <;> dsimp <;> simp [LinearMap.mem_ker]
theorem KaehlerDifferential.linearCombination_surjective :
Function.Surjective (Finsupp.linearCombination S (KaehlerDifferential.D R S)) := by
rw [← LinearMap.range_eq_top, range_linearCombination, span_range_derivation]
/-- `Ω[S⁄R]` is isomorphic to `S` copies of `S` with kernel `KaehlerDifferential.kerTotal`. -/
@[simps!]
noncomputable def KaehlerDifferential.quotKerTotalEquiv :
((S →₀ S) ⧸ KaehlerDifferential.kerTotal R S) ≃ₗ[S] Ω[S⁄R] :=
{ (KaehlerDifferential.kerTotal R S).liftQ
(Finsupp.linearCombination S (KaehlerDifferential.D R S))
(KaehlerDifferential.kerTotal_eq R S).ge with
invFun := (KaehlerDifferential.derivationQuotKerTotal R S).liftKaehlerDifferential
left_inv := by
intro x
obtain ⟨x, rfl⟩ := Submodule.mkQ_surjective _ x
exact
LinearMap.congr_fun
(KaehlerDifferential.derivationQuotKerTotal_lift_comp_linearCombination R S :) x
right_inv := by
intro x
obtain ⟨x, rfl⟩ := KaehlerDifferential.linearCombination_surjective R S x
have := LinearMap.congr_fun
(KaehlerDifferential.derivationQuotKerTotal_lift_comp_linearCombination R S) x
rw [LinearMap.comp_apply] at this
rw [this]
rfl }
theorem KaehlerDifferential.quotKerTotalEquiv_symm_comp_D :
(KaehlerDifferential.quotKerTotalEquiv R S).symm.toLinearMap.compDer
(KaehlerDifferential.D R S) =
KaehlerDifferential.derivationQuotKerTotal R S := by
convert (KaehlerDifferential.derivationQuotKerTotal R S).liftKaehlerDifferential_comp
end Presentation
section ExactSequence
/- We have the commutative diagram
```
A --→ B
↑ ↑
| |
R --→ S
```
-/
variable (A B : Type*) [CommRing A] [CommRing B] [Algebra R A]
variable [Algebra A B] [Algebra S B]
unsuppress_compilation in
-- The map `(A →₀ A) →ₗ[A] (B →₀ B)`
local macro "finsupp_map" : term =>
`((Finsupp.mapRange.linearMap (Algebra.linearMap A B)).comp
(Finsupp.lmapDomain A A (algebraMap A B)))
/--
Given the commutative diagram
```
A --→ B
↑ ↑
| |
R --→ S
```
The kernel of the presentation `⊕ₓ B dx ↠ Ω_{B/S}` is spanned by the image of the
| kernel of `⊕ₓ A dx ↠ Ω_{A/R}` and all `ds` with `s : S`.
See `kerTotal_map'` for the special case where `R = S`.
-/
theorem KaehlerDifferential.kerTotal_map [Algebra R B] [IsScalarTower R A B] [IsScalarTower R S B]
(h : Function.Surjective (algebraMap A B)) :
(KaehlerDifferential.kerTotal R A).map finsupp_map ⊔
Submodule.span A (Set.range fun x : S => .single (algebraMap S B x) (1 : B)) =
(KaehlerDifferential.kerTotal S B).restrictScalars _ := by
rw [KaehlerDifferential.kerTotal, Submodule.map_span, KaehlerDifferential.kerTotal,
Submodule.restrictScalars_span _ _ h]
simp_rw [Set.image_union, Submodule.span_union, ← Set.image_univ, Set.image_image, Set.image_univ,
map_sub, map_add]
simp only [LinearMap.comp_apply, Finsupp.lmapDomain_apply, Finsupp.mapDomain_single,
Finsupp.mapRange.linearMap_apply, Finsupp.mapRange_single, Algebra.linearMap_apply,
map_one, map_add, map_mul]
simp_rw [sup_assoc, ← (h.prodMap h).range_comp]
congr!
-- Porting note: new
simp_rw [← IsScalarTower.algebraMap_apply R A B]
rw [sup_eq_right]
| Mathlib/RingTheory/Kaehler/Basic.lean | 641 | 660 |
/-
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.Localization.CalculusOfFractions
/-!
# Lemmas on fractions
Let `W : MorphismProperty C`, and objects `X` and `Y` in `C`. In this file,
we introduce structures like `W.LeftFraction₂ X Y` which consists of two
left fractions with the "same denominator" which shall be important in
the construction of the preadditive structure on the localized category
when `C` is preadditive and `W` has a left calculus of fractions.
When `W` has a left calculus of fractions, we generalize the lemmas
`RightFraction.exists_leftFraction` as `RightFraction₂.exists_leftFraction₂`,
`Localization.exists_leftFraction` as `Localization.exists_leftFraction₂` and
`Localization.exists_leftFraction₃`, and
`LeftFraction.map_eq_iff` as `LeftFraction₂.map_eq_iff`.
## Implementation note
The lemmas in this file are phrased with data that is bundled into structures like
`LeftFraction₂` or `LeftFraction₃`. It could have been possible to phrase them
with "unbundled data". However, this would require introducing 4 or 5 variables instead
of one. It is also very convenient to use dot notation.
Many definitions have been made reducible so as to ease rewrites when this API is used.
-/
namespace CategoryTheory
variable {C D : Type*} [Category C] [Category D] (L : C ⥤ D) (W : MorphismProperty C)
[L.IsLocalization W]
namespace MorphismProperty
/-- This structure contains the data of two left fractions for
`W : MorphismProperty C` that have the same "denominator". -/
structure LeftFraction₂ (X Y : C) where
/-- the auxiliary object of left fractions -/
{Y' : C}
/-- the numerator of the first left fraction -/
f : X ⟶ Y'
/-- the numerator of the second left fraction -/
f' : X ⟶ Y'
/-- the denominator of the left fractions -/
s : Y ⟶ Y'
/-- the condition that the denominator belongs to the given morphism property -/
hs : W s
/-- This structure contains the data of three left fractions for
`W : MorphismProperty C` that have the same "denominator". -/
structure LeftFraction₃ (X Y : C) where
/-- the auxiliary object of left fractions -/
{Y' : C}
/-- the numerator of the first left fraction -/
f : X ⟶ Y'
/-- the numerator of the second left fraction -/
f' : X ⟶ Y'
/-- the numerator of the third left fraction -/
f'' : X ⟶ Y'
/-- the denominator of the left fractions -/
s : Y ⟶ Y'
/-- the condition that the denominator belongs to the given morphism property -/
hs : W s
/-- This structure contains the data of two right fractions for
`W : MorphismProperty C` that have the same "denominator". -/
structure RightFraction₂ (X Y : C) where
/-- the auxiliary object of right fractions -/
{X' : C}
/-- the denominator of the right fractions -/
s : X' ⟶ X
/-- the condition that the denominator belongs to the given morphism property -/
hs : W s
/-- the numerator of the first right fraction -/
f : X' ⟶ Y
/-- the numerator of the second right fraction -/
f' : X' ⟶ Y
variable {W}
/-- The equivalence relation on tuples of left fractions with the same denominator
for a morphism property `W`. The fact it is an equivalence relation is not
formalized, but it would follow easily from `LeftFraction₂.map_eq_iff`. -/
def LeftFraction₂Rel {X Y : C} (z₁ z₂ : W.LeftFraction₂ X Y) : Prop :=
∃ (Z : C) (t₁ : z₁.Y' ⟶ Z) (t₂ : z₂.Y' ⟶ Z) (_ : z₁.s ≫ t₁ = z₂.s ≫ t₂)
(_ : z₁.f ≫ t₁ = z₂.f ≫ t₂) (_ : z₁.f' ≫ t₁ = z₂.f' ≫ t₂), W (z₁.s ≫ t₁)
namespace LeftFraction₂
variable {X Y : C} (φ : W.LeftFraction₂ X Y)
/-- The first left fraction. -/
abbrev fst : W.LeftFraction X Y where
Y' := φ.Y'
f := φ.f
s := φ.s
hs := φ.hs
/-- The second left fraction. -/
abbrev snd : W.LeftFraction X Y where
Y' := φ.Y'
f := φ.f'
s := φ.s
hs := φ.hs
/-- The exchange of the two fractions. -/
abbrev symm : W.LeftFraction₂ X Y where
Y' := φ.Y'
f := φ.f'
f' := φ.f
s := φ.s
hs := φ.hs
end LeftFraction₂
namespace LeftFraction₃
variable {X Y : C} (φ : W.LeftFraction₃ X Y)
/-- The first left fraction. -/
abbrev fst : W.LeftFraction X Y where
Y' := φ.Y'
f := φ.f
s := φ.s
hs := φ.hs
/-- The second left fraction. -/
abbrev snd : W.LeftFraction X Y where
Y' := φ.Y'
f := φ.f'
s := φ.s
hs := φ.hs
/-- The third left fraction. -/
abbrev thd : W.LeftFraction X Y where
Y' := φ.Y'
f := φ.f''
s := φ.s
hs := φ.hs
/-- Forgets the first fraction. -/
abbrev forgetFst : W.LeftFraction₂ X Y where
Y' := φ.Y'
f := φ.f'
f' := φ.f''
s := φ.s
hs := φ.hs
/-- Forgets the second fraction. -/
abbrev forgetSnd : W.LeftFraction₂ X Y where
Y' := φ.Y'
f := φ.f
f' := φ.f''
s := φ.s
hs := φ.hs
/-- Forgets the third fraction. -/
abbrev forgetThd : W.LeftFraction₂ X Y where
Y' := φ.Y'
f := φ.f
f' := φ.f'
s := φ.s
hs := φ.hs
end LeftFraction₃
namespace LeftFraction₂Rel
variable {X Y : C} {z₁ z₂ : W.LeftFraction₂ X Y}
lemma fst (h : LeftFraction₂Rel z₁ z₂) : LeftFractionRel z₁.fst z₂.fst := by
obtain ⟨Z, t₁, t₂, hst, hft, _, ht⟩ := h
exact ⟨Z, t₁, t₂, hst, hft, ht⟩
| lemma snd (h : LeftFraction₂Rel z₁ z₂) : LeftFractionRel z₁.snd z₂.snd := by
obtain ⟨Z, t₁, t₂, hst, _, hft', ht⟩ := h
exact ⟨Z, t₁, t₂, hst, hft', ht⟩
| Mathlib/CategoryTheory/Localization/CalculusOfFractions/Fractions.lean | 180 | 182 |
/-
Copyright (c) 2020 Alexander Bentkamp, Sébastien Gouëzel. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.
Authors: Alexander Bentkamp, Sébastien Gouëzel, Eric Wieser
-/
import Mathlib.Algebra.Algebra.RestrictScalars
import Mathlib.Algebra.CharP.Invertible
import Mathlib.Data.Complex.Basic
import Mathlib.LinearAlgebra.Matrix.ToLin
import Mathlib.Data.Real.Star
import Mathlib.Data.ZMod.Defs
/-!
# Complex number as a vector space over `ℝ`
This file contains the following instances:
* Any `•`-structure (`SMul`, `MulAction`, `DistribMulAction`, `Module`, `Algebra`) on
`ℝ` imbues a corresponding structure on `ℂ`. This includes the statement that `ℂ` is an `ℝ`
algebra.
* any complex vector space is a real vector space;
* any finite dimensional complex vector space is a finite dimensional real vector space;
* the space of `ℝ`-linear maps from a real vector space to a complex vector space is a complex
vector space.
It also defines bundled versions of four standard maps (respectively, the real part, the imaginary
part, the embedding of `ℝ` in `ℂ`, and the complex conjugate):
* `Complex.reLm` (`ℝ`-linear map);
* `Complex.imLm` (`ℝ`-linear map);
* `Complex.ofRealAm` (`ℝ`-algebra (homo)morphism);
* `Complex.conjAe` (`ℝ`-algebra equivalence).
It also provides a universal property of the complex numbers `Complex.lift`, which constructs a
`ℂ →ₐ[ℝ] A` into any `ℝ`-algebra `A` given a square root of `-1`.
In addition, this file provides a decomposition into `realPart` and `imaginaryPart` for any
element of a `StarModule` over `ℂ`.
## Notation
* `ℜ` and `ℑ` for the `realPart` and `imaginaryPart`, respectively, in the locale
`ComplexStarModule`.
-/
assert_not_exists NNReal
namespace Complex
open ComplexConjugate
open scoped SMul
variable {R : Type*} {S : Type*}
attribute [local ext] Complex.ext
/- The priority of the following instances has been manually lowered, as when they don't apply
they lead Lean to a very costly path, and most often they don't apply (most actions on `ℂ` don't
come from actions on `ℝ`). See https://github.com/leanprover-community/mathlib4/pull/11980 -/
-- priority manually adjusted in https://github.com/leanprover-community/mathlib4/pull/11980
instance (priority := 90) [SMul R ℝ] [SMul S ℝ] [SMulCommClass R S ℝ] : SMulCommClass R S ℂ where
smul_comm r s x := by ext <;> simp [smul_re, smul_im, smul_comm]
-- priority manually adjusted in https://github.com/leanprover-community/mathlib4/pull/11980
instance (priority := 90) [SMul R S] [SMul R ℝ] [SMul S ℝ] [IsScalarTower R S ℝ] :
IsScalarTower R S ℂ where
smul_assoc r s x := by ext <;> simp [smul_re, smul_im, smul_assoc]
-- priority manually adjusted in https://github.com/leanprover-community/mathlib4/pull/11980
instance (priority := 90) [SMul R ℝ] [SMul Rᵐᵒᵖ ℝ] [IsCentralScalar R ℝ] :
IsCentralScalar R ℂ where
op_smul_eq_smul r x := by ext <;> simp [smul_re, smul_im, op_smul_eq_smul]
-- priority manually adjusted in https://github.com/leanprover-community/mathlib4/pull/11980
instance (priority := 90) mulAction [Monoid R] [MulAction R ℝ] : MulAction R ℂ where
one_smul x := by ext <;> simp [smul_re, smul_im, one_smul]
mul_smul r s x := by ext <;> simp [smul_re, smul_im, mul_smul]
-- priority manually adjusted in https://github.com/leanprover-community/mathlib4/pull/11980
instance (priority := 90) distribSMul [DistribSMul R ℝ] : DistribSMul R ℂ where
smul_add r x y := by ext <;> simp [smul_re, smul_im, smul_add]
smul_zero r := by ext <;> simp [smul_re, smul_im, smul_zero]
-- priority manually adjusted in https://github.com/leanprover-community/mathlib4/pull/11980
instance (priority := 90) [Semiring R] [DistribMulAction R ℝ] : DistribMulAction R ℂ :=
{ Complex.distribSMul, Complex.mulAction with }
-- priority manually adjusted in https://github.com/leanprover-community/mathlib4/pull/11980
instance (priority := 100) instModule [Semiring R] [Module R ℝ] : Module R ℂ where
add_smul r s x := by ext <;> simp [smul_re, smul_im, add_smul]
zero_smul r := by ext <;> simp [smul_re, smul_im, zero_smul]
-- priority manually adjusted in https://github.com/leanprover-community/mathlib4/pull/11980
instance (priority := 95) instAlgebraOfReal [CommSemiring R] [Algebra R ℝ] : Algebra R ℂ where
algebraMap := Complex.ofRealHom.comp (algebraMap R ℝ)
smul := (· • ·)
smul_def' := fun r x => by ext <;> simp [smul_re, smul_im, Algebra.smul_def]
commutes' := fun r ⟨xr, xi⟩ => by ext <;> simp [smul_re, smul_im, Algebra.commutes]
instance : StarModule ℝ ℂ :=
⟨fun r x => by simp only [star_def, star_trivial, real_smul, map_mul, conj_ofReal]⟩
@[simp]
theorem coe_algebraMap : (algebraMap ℝ ℂ : ℝ → ℂ) = ((↑) : ℝ → ℂ) :=
rfl
section
variable {A : Type*} [Semiring A] [Algebra ℝ A]
/-- We need this lemma since `Complex.coe_algebraMap` diverts the simp-normal form away from
`AlgHom.commutes`. -/
@[simp]
theorem _root_.AlgHom.map_coe_real_complex (f : ℂ →ₐ[ℝ] A) (x : ℝ) : f x = algebraMap ℝ A x :=
f.commutes x
/-- Two `ℝ`-algebra homomorphisms from `ℂ` are equal if they agree on `Complex.I`. -/
@[ext]
theorem algHom_ext ⦃f g : ℂ →ₐ[ℝ] A⦄ (h : f I = g I) : f = g := by
ext ⟨x, y⟩
simp only [mk_eq_add_mul_I, map_add, AlgHom.map_coe_real_complex, map_mul, h]
end
open Submodule
/-- `ℂ` has a basis over `ℝ` given by `1` and `I`. -/
noncomputable def basisOneI : Basis (Fin 2) ℝ ℂ :=
Basis.ofEquivFun
{ toFun := fun z => ![z.re, z.im]
invFun := fun c => c 0 + c 1 • I
left_inv := fun z => by simp
right_inv := fun c => by
ext i
fin_cases i <;> simp
map_add' := fun z z' => by simp
map_smul' := fun c z => by simp }
@[simp]
theorem coe_basisOneI_repr (z : ℂ) : ⇑(basisOneI.repr z) = ![z.re, z.im] :=
rfl
@[simp]
theorem coe_basisOneI : ⇑basisOneI = ![1, I] :=
funext fun i =>
Basis.apply_eq_iff.mpr <|
Finsupp.ext fun j => by
fin_cases i <;> fin_cases j <;> simp
end Complex
/- Register as an instance (with low priority) the fact that a complex vector space is also a real
vector space. -/
instance (priority := 900) Module.complexToReal (E : Type*) [AddCommGroup E] [Module ℂ E] :
Module ℝ E :=
RestrictScalars.module ℝ ℂ E
/- Register as an instance (with low priority) the fact that a complex algebra is also a real
algebra. -/
instance (priority := 900) Algebra.complexToReal {A : Type*} [Semiring A] [Algebra ℂ A] :
Algebra ℝ A :=
RestrictScalars.algebra ℝ ℂ A
-- try to make sure we're not introducing diamonds but we will need
-- `reducible_and_instances` which currently fails https://github.com/leanprover-community/mathlib4/issues/10906
example : Prod.algebra ℝ ℂ ℂ = (Prod.algebra ℂ ℂ ℂ).complexToReal := rfl
-- try to make sure we're not introducing diamonds but we will need
-- `reducible_and_instances` which currently fails https://github.com/leanprover-community/mathlib4/issues/10906
example {ι : Type*} [Fintype ι] :
Pi.algebra (R := ℝ) ι (fun _ ↦ ℂ) = (Pi.algebra (R := ℂ) ι (fun _ ↦ ℂ)).complexToReal :=
rfl
example {A : Type*} [Ring A] [inst : Algebra ℂ A] :
(inst.complexToReal).toModule = (inst.toModule).complexToReal := by
with_reducible_and_instances rfl
@[simp, norm_cast]
theorem Complex.coe_smul {E : Type*} [AddCommGroup E] [Module ℂ E] (x : ℝ) (y : E) :
(x : ℂ) • y = x • y :=
rfl
/-- The scalar action of `ℝ` on a `ℂ`-module `E` induced by `Module.complexToReal` commutes with
another scalar action of `M` on `E` whenever the action of `ℂ` commutes with the action of `M`. -/
instance (priority := 900) SMulCommClass.complexToReal {M E : Type*} [AddCommGroup E] [Module ℂ E]
[SMul M E] [SMulCommClass ℂ M E] : SMulCommClass ℝ M E where
smul_comm r _ _ := smul_comm (r : ℂ) _ _
/-- The scalar action of `ℝ` on a `ℂ`-module `E` induced by `Module.complexToReal` associates with
another scalar action of `M` on `E` whenever the action of `ℂ` associates with the action of `M`. -/
instance IsScalarTower.complexToReal {M E : Type*} [AddCommGroup M] [Module ℂ M] [AddCommGroup E]
[Module ℂ E] [SMul M E] [IsScalarTower ℂ M E] : IsScalarTower ℝ M E where
smul_assoc r _ _ := smul_assoc (r : ℂ) _ _
-- check that the following instance is implied by the one above.
example (E : Type*) [AddCommGroup E] [Module ℂ E] : IsScalarTower ℝ ℂ E := inferInstance
instance (priority := 900) StarModule.complexToReal {E : Type*} [AddCommGroup E] [Star E]
[Module ℂ E] [StarModule ℂ E] : StarModule ℝ E :=
⟨fun r a => by rw [← smul_one_smul ℂ r a, star_smul, star_smul, star_one, smul_one_smul]⟩
namespace Complex
open ComplexConjugate
/-- Linear map version of the real part function, from `ℂ` to `ℝ`. -/
def reLm : ℂ →ₗ[ℝ] ℝ where
toFun x := x.re
map_add' := add_re
map_smul' := by simp
@[simp]
theorem reLm_coe : ⇑reLm = re :=
rfl
/-- Linear map version of the imaginary part function, from `ℂ` to `ℝ`. -/
def imLm : ℂ →ₗ[ℝ] ℝ where
toFun x := x.im
map_add' := add_im
map_smul' := by simp
@[simp]
theorem imLm_coe : ⇑imLm = im :=
rfl
/-- `ℝ`-algebra morphism version of the canonical embedding of `ℝ` in `ℂ`. -/
def ofRealAm : ℝ →ₐ[ℝ] ℂ :=
Algebra.ofId ℝ ℂ
@[simp]
theorem ofRealAm_coe : ⇑ofRealAm = ((↑) : ℝ → ℂ) :=
rfl
/-- `ℝ`-algebra isomorphism version of the complex conjugation function from `ℂ` to `ℂ` -/
def conjAe : ℂ ≃ₐ[ℝ] ℂ :=
{ conj with
invFun := conj
left_inv := star_star
right_inv := star_star
commutes' := conj_ofReal }
@[simp]
theorem conjAe_coe : ⇑conjAe = conj :=
rfl
/-- The matrix representation of `conjAe`. -/
@[simp]
theorem toMatrix_conjAe :
LinearMap.toMatrix basisOneI basisOneI conjAe.toLinearMap = !![1, 0; 0, -1] := by
ext i j
fin_cases i <;> fin_cases j <;> simp [LinearMap.toMatrix_apply]
/-- The identity and the complex conjugation are the only two `ℝ`-algebra homomorphisms of `ℂ`. -/
theorem real_algHom_eq_id_or_conj (f : ℂ →ₐ[ℝ] ℂ) : f = AlgHom.id ℝ ℂ ∨ f = conjAe := by
refine
(eq_or_eq_neg_of_sq_eq_sq (f I) I <| by rw [← map_pow, I_sq, map_neg, map_one]).imp ?_ ?_ <;>
refine fun h => algHom_ext ?_
exacts [h, conj_I.symm ▸ h]
/-- The natural `LinearEquiv` from `ℂ` to `ℝ × ℝ`. -/
@[simps! +simpRhs apply symm_apply_re symm_apply_im]
def equivRealProdLm : ℂ ≃ₗ[ℝ] ℝ × ℝ :=
{ equivRealProdAddHom with
map_smul' := fun r c => by simp }
theorem equivRealProdLm_symm_apply (p : ℝ × ℝ) :
Complex.equivRealProdLm.symm p = p.1 + p.2 * Complex.I := Complex.equivRealProd_symm_apply p
section lift
variable {A : Type*} [Ring A] [Algebra ℝ A]
/-- There is an alg_hom from `ℂ` to any `ℝ`-algebra with an element that squares to `-1`.
See `Complex.lift` for this as an equiv. -/
def liftAux (I' : A) (hf : I' * I' = -1) : ℂ →ₐ[ℝ] A :=
AlgHom.ofLinearMap
((Algebra.linearMap ℝ A).comp reLm + (LinearMap.toSpanSingleton _ _ I').comp imLm)
(show algebraMap ℝ A 1 + (0 : ℝ) • I' = 1 by rw [RingHom.map_one, zero_smul, add_zero])
fun ⟨x₁, y₁⟩ ⟨x₂, y₂⟩ =>
show
algebraMap ℝ A (x₁ * x₂ - y₁ * y₂) + (x₁ * y₂ + y₁ * x₂) • I' =
(algebraMap ℝ A x₁ + y₁ • I') * (algebraMap ℝ A x₂ + y₂ • I') by
rw [add_mul, mul_add, mul_add, add_comm _ (y₁ • I' * y₂ • I'), add_add_add_comm]
congr 1
-- equate "real" and "imaginary" parts
· rw [smul_mul_smul_comm, hf, smul_neg, ← Algebra.algebraMap_eq_smul_one, ← sub_eq_add_neg,
← RingHom.map_mul, ← RingHom.map_sub]
· rw [Algebra.smul_def, Algebra.smul_def, Algebra.smul_def, ← Algebra.right_comm _ x₂,
← mul_assoc, ← add_mul, ← RingHom.map_mul, ← RingHom.map_mul, ← RingHom.map_add]
@[simp]
theorem liftAux_apply (I' : A) (hI') (z : ℂ) : liftAux I' hI' z = algebraMap ℝ A z.re + z.im • I' :=
rfl
theorem liftAux_apply_I (I' : A) (hI') : liftAux I' hI' I = I' := by simp
/-- A universal property of the complex numbers, providing a unique `ℂ →ₐ[ℝ] A` for every element
of `A` which squares to `-1`.
This can be used to embed the complex numbers in the `Quaternion`s.
This isomorphism is named to match the very similar `Zsqrtd.lift`. -/
@[simps +simpRhs]
def lift : { I' : A // I' * I' = -1 } ≃ (ℂ →ₐ[ℝ] A) where
toFun I' := liftAux I' I'.prop
invFun F := ⟨F I, by rw [← map_mul, I_mul_I, map_neg, map_one]⟩
left_inv I' := Subtype.ext <| liftAux_apply_I (I' : A) I'.prop
right_inv _ := algHom_ext <| liftAux_apply_I _ _
-- When applied to `Complex.I` itself, `lift` is the identity.
@[simp]
theorem liftAux_I : liftAux I I_mul_I = AlgHom.id ℝ ℂ :=
algHom_ext <| liftAux_apply_I _ _
-- When applied to `-Complex.I`, `lift` is conjugation, `conj`.
@[simp]
theorem liftAux_neg_I : liftAux (-I) ((neg_mul_neg _ _).trans I_mul_I) = conjAe :=
algHom_ext <| (liftAux_apply_I _ _).trans conj_I.symm
end lift
end Complex
section RealImaginaryPart
open Complex
variable {A : Type*} [AddCommGroup A] [Module ℂ A] [StarAddMonoid A] [StarModule ℂ A]
/-- Create a `selfAdjoint` element from a `skewAdjoint` element by multiplying by the scalar
`-Complex.I`. -/
@[simps]
def skewAdjoint.negISMul : skewAdjoint A →ₗ[ℝ] selfAdjoint A where
toFun a :=
⟨-I • ↑a, by
simp only [neg_smul, neg_mem_iff, selfAdjoint.mem_iff, star_smul, star_def, conj_I,
star_val_eq, smul_neg, neg_neg]⟩
map_add' a b := by
ext
simp only [AddSubgroup.coe_add, smul_add, AddMemClass.mk_add_mk]
map_smul' a b := by
ext
simp only [neg_smul, skewAdjoint.val_smul, AddSubgroup.coe_mk, RingHom.id_apply,
selfAdjoint.val_smul, smul_neg, neg_inj]
rw [smul_comm]
theorem skewAdjoint.I_smul_neg_I (a : skewAdjoint A) : I • (skewAdjoint.negISMul a : A) = a := by
simp only [smul_smul, skewAdjoint.negISMul_apply_coe, neg_smul, smul_neg, I_mul_I, one_smul,
neg_neg]
/-- The real part `ℜ a` of an element `a` of a star module over `ℂ`, as a linear map. This is just
`selfAdjointPart ℝ`, but we provide it as a separate definition in order to link it with lemmas
concerning the `imaginaryPart`, which doesn't exist in star modules over other rings. -/
noncomputable def realPart : A →ₗ[ℝ] selfAdjoint A :=
selfAdjointPart ℝ
/-- The imaginary part `ℑ a` of an element `a` of a star module over `ℂ`, as a linear map into the
self adjoint elements. In a general star module, we have a decomposition into the `selfAdjoint`
and `skewAdjoint` parts, but in a star module over `ℂ` we have
`realPart_add_I_smul_imaginaryPart`, which allows us to decompose into a linear combination of
`selfAdjoint`s. -/
noncomputable def imaginaryPart : A →ₗ[ℝ] selfAdjoint A :=
skewAdjoint.negISMul.comp (skewAdjointPart ℝ)
@[inherit_doc]
scoped[ComplexStarModule] notation "ℜ" => realPart
@[inherit_doc]
scoped[ComplexStarModule] notation "ℑ" => imaginaryPart
open ComplexStarModule
theorem realPart_apply_coe (a : A) : (ℜ a : A) = (2 : ℝ)⁻¹ • (a + star a) := by
unfold realPart
simp only [selfAdjointPart_apply_coe, invOf_eq_inv]
theorem imaginaryPart_apply_coe (a : A) : (ℑ a : A) = -I • (2 : ℝ)⁻¹ • (a - star a) := by
unfold imaginaryPart
simp only [LinearMap.coe_comp, Function.comp_apply, skewAdjoint.negISMul_apply_coe,
skewAdjointPart_apply_coe, invOf_eq_inv, neg_smul]
/-- The standard decomposition of `ℜ a + Complex.I • ℑ a = a` of an element of a star module over
`ℂ` into a linear combination of self adjoint elements. -/
theorem realPart_add_I_smul_imaginaryPart (a : A) : (ℜ a : A) + I • (ℑ a : A) = a := by
simpa only [smul_smul, realPart_apply_coe, imaginaryPart_apply_coe, neg_smul, I_mul_I, one_smul,
neg_sub, add_add_sub_cancel, smul_sub, smul_add, neg_sub_neg, invOf_eq_inv] using
invOf_two_smul_add_invOf_two_smul ℝ a
@[simp]
theorem realPart_I_smul (a : A) : ℜ (I • a) = -ℑ a := by
ext
simp [realPart_apply_coe, imaginaryPart_apply_coe, smul_comm I, sub_eq_add_neg, add_comm]
@[simp]
theorem imaginaryPart_I_smul (a : A) : ℑ (I • a) = ℜ a := by
ext
simp [realPart_apply_coe, imaginaryPart_apply_coe, smul_comm I (2⁻¹ : ℝ), smul_smul I]
theorem realPart_smul (z : ℂ) (a : A) : ℜ (z • a) = z.re • ℜ a - z.im • ℑ a := by
have := by congrm (ℜ ($((re_add_im z).symm) • a))
simpa [-re_add_im, add_smul, ← smul_smul, sub_eq_add_neg]
theorem imaginaryPart_smul (z : ℂ) (a : A) : ℑ (z • a) = z.re • ℑ a + z.im • ℜ a := by
have := by congrm (ℑ ($((re_add_im z).symm) • a))
simpa [-re_add_im, add_smul, ← smul_smul]
lemma skewAdjointPart_eq_I_smul_imaginaryPart (x : A) :
(skewAdjointPart ℝ x : A) = I • (imaginaryPart x : A) := by
simp [imaginaryPart_apply_coe, smul_smul]
lemma imaginaryPart_eq_neg_I_smul_skewAdjointPart (x : A) :
(imaginaryPart x : A) = -I • (skewAdjointPart ℝ x : A) :=
rfl
lemma IsSelfAdjoint.coe_realPart {x : A} (hx : IsSelfAdjoint x) :
(ℜ x : A) = x :=
hx.coe_selfAdjointPart_apply ℝ
nonrec lemma IsSelfAdjoint.imaginaryPart {x : A} (hx : IsSelfAdjoint x) :
ℑ x = 0 := by
rw [imaginaryPart, LinearMap.comp_apply, hx.skewAdjointPart_apply _, map_zero]
lemma realPart_comp_subtype_selfAdjoint :
realPart.comp (selfAdjoint.submodule ℝ A).subtype = LinearMap.id :=
selfAdjointPart_comp_subtype_selfAdjoint ℝ
lemma imaginaryPart_comp_subtype_selfAdjoint :
imaginaryPart.comp (selfAdjoint.submodule ℝ A).subtype = 0 := by
rw [imaginaryPart, LinearMap.comp_assoc, skewAdjointPart_comp_subtype_selfAdjoint,
LinearMap.comp_zero]
@[simp]
lemma imaginaryPart_realPart {x : A} : ℑ (ℜ x : A) = 0 :=
(ℜ x).property.imaginaryPart
@[simp]
| lemma imaginaryPart_imaginaryPart {x : A} : ℑ (ℑ x : A) = 0 :=
(ℑ x).property.imaginaryPart
@[simp]
| Mathlib/Data/Complex/Module.lean | 437 | 440 |
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