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/- 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	1,901	1,902
/- Copyright (c) 2021 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Analysis.Calculus.ContDiff.RCLike import Mathlib.MeasureTheory.Measure.Hausdorff /-! # Hausdorff dimension The Hausdorff dimension of a set `X` in an (extended) metric space is the unique number `dimH s : ℝ≥0∞` such that for any `d : ℝ≥0` we have - `μH[d] s = 0` if `dimH s < d`, and - `μH[d] s = ∞` if `d < dimH s`. In this file we define `dimH s` to be the Hausdorff dimension of `s`, then prove some basic properties of Hausdorff dimension. ## Main definitions * `MeasureTheory.dimH`: the Hausdorff dimension of a set. For the Hausdorff dimension of the whole space we use `MeasureTheory.dimH (Set.univ : Set X)`. ## Main results ### Basic properties of Hausdorff dimension * `hausdorffMeasure_of_lt_dimH`, `dimH_le_of_hausdorffMeasure_ne_top`, `le_dimH_of_hausdorffMeasure_eq_top`, `hausdorffMeasure_of_dimH_lt`, `measure_zero_of_dimH_lt`, `le_dimH_of_hausdorffMeasure_ne_zero`, `dimH_of_hausdorffMeasure_ne_zero_ne_top`: various forms of the characteristic property of the Hausdorff dimension; * `dimH_union`: the Hausdorff dimension of the union of two sets is the maximum of their Hausdorff dimensions. * `dimH_iUnion`, `dimH_bUnion`, `dimH_sUnion`: the Hausdorff dimension of a countable union of sets is the supremum of their Hausdorff dimensions; * `dimH_empty`, `dimH_singleton`, `Set.Subsingleton.dimH_zero`, `Set.Countable.dimH_zero` : `dimH s = 0` whenever `s` is countable; ### (Pre)images under (anti)lipschitz and Hölder continuous maps * `HolderWith.dimH_image_le` etc: if `f : X → Y` is Hölder continuous with exponent `r > 0`, then for any `s`, `dimH (f '' s) ≤ dimH s / r`. We prove versions of this statement for `HolderWith`, `HolderOnWith`, and locally Hölder maps, as well as for `Set.image` and `Set.range`. * `LipschitzWith.dimH_image_le` etc: Lipschitz continuous maps do not increase the Hausdorff dimension of sets. * for a map that is known to be both Lipschitz and antilipschitz (e.g., for an `Isometry` or a `ContinuousLinearEquiv`) we also prove `dimH (f '' s) = dimH s`. ### Hausdorff measure in `ℝⁿ` * `Real.dimH_of_nonempty_interior`: if `s` is a set in a finite dimensional real vector space `E` with nonempty interior, then the Hausdorff dimension of `s` is equal to the dimension of `E`. * `dense_compl_of_dimH_lt_finrank`: if `s` is a set in a finite dimensional real vector space `E` with Hausdorff dimension strictly less than the dimension of `E`, the `s` has a dense complement. * `ContDiff.dense_compl_range_of_finrank_lt_finrank`: the complement to the range of a `C¹` smooth map is dense provided that the dimension of the domain is strictly less than the dimension of the codomain. ## Notations We use the following notation localized in `MeasureTheory`. It is defined in `MeasureTheory.Measure.Hausdorff`. - `μH[d]` : `MeasureTheory.Measure.hausdorffMeasure d` ## Implementation notes * The definition of `dimH` explicitly uses `borel X` as a measurable space structure. This way we can formulate lemmas about Hausdorff dimension without assuming that the environment has a `[MeasurableSpace X]` instance that is equal but possibly not defeq to `borel X`. Lemma `dimH_def` unfolds this definition using whatever `[MeasurableSpace X]` instance we have in the environment (as long as it is equal to `borel X`). * The definition `dimH` is irreducible; use API lemmas or `dimH_def` instead. ## Tags Hausdorff measure, Hausdorff dimension, dimension -/ open scoped MeasureTheory ENNReal NNReal Topology open MeasureTheory MeasureTheory.Measure Set TopologicalSpace Module Filter variable {ι X Y : Type*} [EMetricSpace X] [EMetricSpace Y] /-- Hausdorff dimension of a set in an (e)metric space. -/ @[irreducible] noncomputable def dimH (s : Set X) : ℝ≥0∞ := by borelize X; exact ⨆ (d : ℝ≥0) (_ : @hausdorffMeasure X _ _ ⟨rfl⟩ d s = ∞), d /-! ### Basic properties -/ section Measurable variable [MeasurableSpace X] [BorelSpace X] /-- Unfold the definition of `dimH` using `[MeasurableSpace X] [BorelSpace X]` from the environment. -/ theorem dimH_def (s : Set X) : dimH s = ⨆ (d : ℝ≥0) (_ : μH[d] s = ∞), (d : ℝ≥0∞) := by borelize X; rw [dimH] theorem hausdorffMeasure_of_lt_dimH {s : Set X} {d : ℝ≥0} (h : ↑d < dimH s) : μH[d] s = ∞ := by simp only [dimH_def, lt_iSup_iff] at h rcases h with ⟨d', hsd', hdd'⟩ rw [ENNReal.coe_lt_coe, ← NNReal.coe_lt_coe] at hdd' exact top_unique (hsd' ▸ hausdorffMeasure_mono hdd'.le _) theorem dimH_le {s : Set X} {d : ℝ≥0∞} (H : ∀ d' : ℝ≥0, μH[d'] s = ∞ → ↑d' ≤ d) : dimH s ≤ d := (dimH_def s).trans_le <\| iSup₂_le H theorem dimH_le_of_hausdorffMeasure_ne_top {s : Set X} {d : ℝ≥0} (h : μH[d] s ≠ ∞) : dimH s ≤ d := le_of_not_lt <\| mt hausdorffMeasure_of_lt_dimH h theorem le_dimH_of_hausdorffMeasure_eq_top {s : Set X} {d : ℝ≥0} (h : μH[d] s = ∞) : ↑d ≤ dimH s := by rw [dimH_def]; exact le_iSup₂ (α := ℝ≥0∞) d h theorem hausdorffMeasure_of_dimH_lt {s : Set X} {d : ℝ≥0} (h : dimH s < d) : μH[d] s = 0 := by rw [dimH_def] at h rcases ENNReal.lt_iff_exists_nnreal_btwn.1 h with ⟨d', hsd', hd'd⟩ rw [ENNReal.coe_lt_coe, ← NNReal.coe_lt_coe] at hd'd exact (hausdorffMeasure_zero_or_top hd'd s).resolve_right fun h₂ => hsd'.not_le <\| le_iSup₂ (α := ℝ≥0∞) d' h₂ theorem measure_zero_of_dimH_lt {μ : Measure X} {d : ℝ≥0} (h : μ ≪ μH[d]) {s : Set X}	(hd : dimH s < d) : μ s = 0 := h <\| hausdorffMeasure_of_dimH_lt hd	Mathlib/Topology/MetricSpace/HausdorffDimension.lean	133	135
/- Copyright (c) 2018 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Kevin Kappelmann -/ import Mathlib.Algebra.Order.Floor.Defs import Mathlib.Algebra.Order.Floor.Ring import Mathlib.Algebra.Order.Floor.Semiring deprecated_module (since := "2025-04-13")		Mathlib/Algebra/Order/Floor.lean	1,255	1,256
/- Copyright (c) 2017 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Stephen Morgan, Kim Morrison, Johannes Hölzl -/ import Mathlib.CategoryTheory.EpiMono import Mathlib.CategoryTheory.Functor.FullyFaithful import Mathlib.Data.Set.CoeSort import Mathlib.Tactic.PPWithUniv import Mathlib.Tactic.ToAdditive /-! # The category `Type`. In this section we set up the theory so that Lean's types and functions between them can be viewed as a `LargeCategory` in our framework. Lean can not transparently view a function as a morphism in this category, and needs a hint in order to be able to type check. We provide the abbreviation `asHom f` to guide type checking, as well as a corresponding notation `↾ f`. (Entered as `\upr `.) We provide various simplification lemmas for functors and natural transformations valued in `Type`. We define `uliftFunctor`, from `Type u` to `Type (max u v)`, and show that it is fully faithful (but not, of course, essentially surjective). We prove some basic facts about the category `Type`: * epimorphisms are surjections and monomorphisms are injections, * `Iso` is both `Iso` and `Equiv` to `Equiv` (at least within a fixed universe), * every type level `IsLawfulFunctor` gives a categorical functor `Type ⥤ Type` (the corresponding fact about monads is in `Mathlib/CategoryTheory/Monad/Types.lean`). -/ namespace CategoryTheory -- morphism levels before object levels. See note [CategoryTheory universes]. universe v v' w u u' /- The `@[to_additive]` attribute is just a hint that expressions involving this instance can still be additivized. -/ @[to_additive existing CategoryTheory.types] instance types : LargeCategory (Type u) where Hom a b := a → b id _ := id comp f g := g ∘ f theorem types_hom {α β : Type u} : (α ⟶ β) = (α → β) := rfl @[ext] theorem types_ext {α β : Type u} (f g : α ⟶ β) (h : ∀ a : α, f a = g a) : f = g := by funext x exact h x theorem types_id (X : Type u) : 𝟙 X = id := rfl theorem types_comp {X Y Z : Type u} (f : X ⟶ Y) (g : Y ⟶ Z) : f ≫ g = g ∘ f := rfl @[simp] theorem types_id_apply (X : Type u) (x : X) : (𝟙 X : X → X) x = x := rfl @[simp] theorem types_comp_apply {X Y Z : Type u} (f : X ⟶ Y) (g : Y ⟶ Z) (x : X) : (f ≫ g) x = g (f x) := rfl @[simp] theorem hom_inv_id_apply {X Y : Type u} (f : X ≅ Y) (x : X) : f.inv (f.hom x) = x := congr_fun f.hom_inv_id x @[simp] theorem inv_hom_id_apply {X Y : Type u} (f : X ≅ Y) (y : Y) : f.hom (f.inv y) = y := congr_fun f.inv_hom_id y -- Unfortunately without this wrapper we can't use `CategoryTheory` idioms, such as `IsIso f`. /-- `asHom f` helps Lean type check a function as a morphism in the category `Type`. -/ abbrev asHom {α β : Type u} (f : α → β) : α ⟶ β := f @[inherit_doc] scoped notation "↾" f:200 => CategoryTheory.asHom f section -- We verify the expected type checking behaviour of `asHom` variable (α β γ : Type u) (f : α → β) (g : β → γ) example : α → γ := ↾f ≫ ↾g example [IsIso (↾f)] : Mono (↾f) := by infer_instance example [IsIso (↾f)] : ↾f ≫ inv (↾f) = 𝟙 α := by simp end namespace Functor variable {J : Type u} [Category.{v} J] /-- The sections of a functor `F : J ⥤ Type` are the choices of a point `u j : F.obj j` for each `j`, such that `F.map f (u j) = u j'` for every morphism `f : j ⟶ j'`. We later use these to define limits in `Type` and in many concrete categories. -/ def sections (F : J ⥤ Type w) : Set (∀ j, F.obj j) := { u \| ∀ {j j'} (f : j ⟶ j'), F.map f (u j) = u j' } @[simp] lemma sections_property {F : J ⥤ Type w} (s : (F.sections : Type _)) {j j' : J} (f : j ⟶ j') : F.map f (s.val j) = s.val j' := s.property f lemma sections_ext_iff {F : J ⥤ Type w} {x y : F.sections} : x = y ↔ ∀ j, x.val j = y.val j := Subtype.ext_iff.trans funext_iff variable (J) /-- The functor which sends a functor to types to its sections. -/ @[simps] def sectionsFunctor : (J ⥤ Type w) ⥤ Type max u w where obj F := F.sections map {F G} φ x := ⟨fun j => φ.app j (x.1 j), fun {j j'} f => (congr_fun (φ.naturality f) (x.1 j)).symm.trans (by simp [x.2 f])⟩ end Functor namespace FunctorToTypes variable {C : Type u} [Category.{v} C] (F G H : C ⥤ Type w) {X Y Z : C} variable (σ : F ⟶ G) (τ : G ⟶ H) @[simp] theorem map_comp_apply (f : X ⟶ Y) (g : Y ⟶ Z) (a : F.obj X) : (F.map (f ≫ g)) a = (F.map g) ((F.map f) a) := by simp [types_comp] @[simp] theorem map_id_apply (a : F.obj X) : (F.map (𝟙 X)) a = a := by simp [types_id] theorem naturality (f : X ⟶ Y) (x : F.obj X) : σ.app Y ((F.map f) x) = (G.map f) (σ.app X x) := congr_fun (σ.naturality f) x @[simp] theorem comp (x : F.obj X) : (σ ≫ τ).app X x = τ.app X (σ.app X x) := rfl @[simp] theorem eqToHom_map_comp_apply (p : X = Y) (q : Y = Z) (x : F.obj X) : F.map (eqToHom q) (F.map (eqToHom p) x) = F.map (eqToHom <\| p.trans q) x := by aesop_cat variable {D : Type u'} [𝒟 : Category.{u'} D] (I J : D ⥤ C) (ρ : I ⟶ J) {W : D} @[simp] theorem hcomp (x : (I ⋙ F).obj W) : (ρ ◫ σ).app W x = (G.map (ρ.app W)) (σ.app (I.obj W) x) := rfl @[simp] theorem map_inv_map_hom_apply (f : X ≅ Y) (x : F.obj X) : F.map f.inv (F.map f.hom x) = x := congr_fun (F.mapIso f).hom_inv_id x @[simp] theorem map_hom_map_inv_apply (f : X ≅ Y) (y : F.obj Y) : F.map f.hom (F.map f.inv y) = y := congr_fun (F.mapIso f).inv_hom_id y	@[simp] theorem hom_inv_id_app_apply (α : F ≅ G) (X) (x) : α.inv.app X (α.hom.app X x) = x := congr_fun (α.hom_inv_id_app X) x	Mathlib/CategoryTheory/Types.lean	169	171
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Floris van Doorn, Violeta Hernández Palacios -/ import Mathlib.Algebra.GroupWithZero.Divisibility import Mathlib.Data.Nat.SuccPred import Mathlib.Order.SuccPred.InitialSeg import Mathlib.SetTheory.Ordinal.Basic /-! # Ordinal arithmetic Ordinals have an addition (corresponding to disjoint union) that turns them into an additive monoid, and a multiplication (corresponding to the lexicographic order on the product) that turns them into a monoid. One can also define correspondingly a subtraction, a division, a successor function, a power function and a logarithm function. We also define limit ordinals and prove the basic induction principle on ordinals separating successor ordinals and limit ordinals, in `limitRecOn`. ## Main definitions and results * `o₁ + o₂` is the order on the disjoint union of `o₁` and `o₂` obtained by declaring that every element of `o₁` is smaller than every element of `o₂`. * `o₁ - o₂` is the unique ordinal `o` such that `o₂ + o = o₁`, when `o₂ ≤ o₁`. * `o₁ * o₂` is the lexicographic order on `o₂ × o₁`. * `o₁ / o₂` is the ordinal `o` such that `o₁ = o₂ * o + o'` with `o' < o₂`. We also define the divisibility predicate, and a modulo operation. * `Order.succ o = o + 1` is the successor of `o`. * `pred o` if the predecessor of `o`. If `o` is not a successor, we set `pred o = o`. We discuss the properties of casts of natural numbers of and of `ω` with respect to these operations. Some properties of the operations are also used to discuss general tools on ordinals: * `IsLimit o`: an ordinal is a limit ordinal if it is neither `0` nor a successor. * `limitRecOn` is the main induction principle of ordinals: if one can prove a property by induction at successor ordinals and at limit ordinals, then it holds for all ordinals. * `IsNormal`: a function `f : Ordinal → Ordinal` satisfies `IsNormal` if it is strictly increasing and order-continuous, i.e., the image `f o` of a limit ordinal `o` is the sup of `f a` for `a < o`. Various other basic arithmetic results are given in `Principal.lean` instead. -/ assert_not_exists Field Module noncomputable section open Function Cardinal Set Equiv Order open scoped Ordinal universe u v w namespace Ordinal variable {α β γ : Type} {r : α → α → Prop} {s : β → β → Prop} {t : γ → γ → Prop} /-! ### Further properties of addition on ordinals -/ @[simp] theorem lift_add (a b : Ordinal.{v}) : lift.{u} (a + b) = lift.{u} a + lift.{u} b := Quotient.inductionOn₂ a b fun ⟨_α, _r, _⟩ ⟨_β, _s, _⟩ => Quotient.sound ⟨(RelIso.preimage Equiv.ulift _).trans (RelIso.sumLexCongr (RelIso.preimage Equiv.ulift _) (RelIso.preimage Equiv.ulift _)).symm⟩ @[simp] theorem lift_succ (a : Ordinal.{v}) : lift.{u} (succ a) = succ (lift.{u} a) := by rw [← add_one_eq_succ, lift_add, lift_one] rfl instance instAddLeftReflectLE : AddLeftReflectLE Ordinal.{u} where elim c a b := by refine inductionOn₃ a b c fun α r _ β s _ γ t _ ⟨f⟩ ↦ ?_ have H₁ a : f (Sum.inl a) = Sum.inl a := by simpa using ((InitialSeg.leAdd t r).trans f).eq (InitialSeg.leAdd t s) a have H₂ a : ∃ b, f (Sum.inr a) = Sum.inr b := by generalize hx : f (Sum.inr a) = x obtain x \| x := x · rw [← H₁, f.inj] at hx contradiction · exact ⟨x, rfl⟩ choose g hg using H₂ refine (RelEmbedding.ofMonotone g fun _ _ h ↦ ?_).ordinal_type_le rwa [← @Sum.lex_inr_inr _ t _ s, ← hg, ← hg, f.map_rel_iff, Sum.lex_inr_inr] instance : IsLeftCancelAdd Ordinal where add_left_cancel a b c h := by simpa only [le_antisymm_iff, add_le_add_iff_left] using h @[deprecated add_left_cancel_iff (since := "2024-12-11")] protected theorem add_left_cancel (a) {b c : Ordinal} : a + b = a + c ↔ b = c := add_left_cancel_iff private theorem add_lt_add_iff_left' (a) {b c : Ordinal} : a + b < a + c ↔ b < c := by rw [← not_le, ← not_le, add_le_add_iff_left] instance instAddLeftStrictMono : AddLeftStrictMono Ordinal.{u} := ⟨fun a _b _c ↦ (add_lt_add_iff_left' a).2⟩ instance instAddLeftReflectLT : AddLeftReflectLT Ordinal.{u} := ⟨fun a _b _c ↦ (add_lt_add_iff_left' a).1⟩ instance instAddRightReflectLT : AddRightReflectLT Ordinal.{u} := ⟨fun _a _b _c ↦ lt_imp_lt_of_le_imp_le fun h => add_le_add_right h _⟩ theorem add_le_add_iff_right {a b : Ordinal} : ∀ n : ℕ, a + n ≤ b + n ↔ a ≤ b \| 0 => by simp \| n + 1 => by simp only [natCast_succ, add_succ, add_succ, succ_le_succ_iff, add_le_add_iff_right] theorem add_right_cancel {a b : Ordinal} (n : ℕ) : a + n = b + n ↔ a = b := by simp only [le_antisymm_iff, add_le_add_iff_right] theorem add_eq_zero_iff {a b : Ordinal} : a + b = 0 ↔ a = 0 ∧ b = 0 := inductionOn₂ a b fun α r _ β s _ => by simp_rw [← type_sum_lex, type_eq_zero_iff_isEmpty] exact isEmpty_sum theorem left_eq_zero_of_add_eq_zero {a b : Ordinal} (h : a + b = 0) : a = 0 := (add_eq_zero_iff.1 h).1 theorem right_eq_zero_of_add_eq_zero {a b : Ordinal} (h : a + b = 0) : b = 0 := (add_eq_zero_iff.1 h).2 /-! ### The predecessor of an ordinal -/ open Classical in /-- The ordinal predecessor of `o` is `o'` if `o = succ o'`, and `o` otherwise. -/ def pred (o : Ordinal) : Ordinal := if h : ∃ a, o = succ a then Classical.choose h else o @[simp] theorem pred_succ (o) : pred (succ o) = o := by have h : ∃ a, succ o = succ a := ⟨_, rfl⟩ simpa only [pred, dif_pos h] using (succ_injective <\| Classical.choose_spec h).symm theorem pred_le_self (o) : pred o ≤ o := by classical exact if h : ∃ a, o = succ a then by let ⟨a, e⟩ := h rw [e, pred_succ]; exact le_succ a else by rw [pred, dif_neg h] theorem pred_eq_iff_not_succ {o} : pred o = o ↔ ¬∃ a, o = succ a := ⟨fun e ⟨a, e'⟩ => by rw [e', pred_succ] at e; exact (lt_succ a).ne e, fun h => dif_neg h⟩ theorem pred_eq_iff_not_succ' {o} : pred o = o ↔ ∀ a, o ≠ succ a := by simpa using pred_eq_iff_not_succ theorem pred_lt_iff_is_succ {o} : pred o < o ↔ ∃ a, o = succ a := Iff.trans (by simp only [le_antisymm_iff, pred_le_self, true_and, not_le]) (iff_not_comm.1 pred_eq_iff_not_succ).symm @[simp] theorem pred_zero : pred 0 = 0 := pred_eq_iff_not_succ'.2 fun a => (succ_ne_zero a).symm theorem succ_pred_iff_is_succ {o} : succ (pred o) = o ↔ ∃ a, o = succ a := ⟨fun e => ⟨_, e.symm⟩, fun ⟨a, e⟩ => by simp only [e, pred_succ]⟩ theorem succ_lt_of_not_succ {o b : Ordinal} (h : ¬∃ a, o = succ a) : succ b < o ↔ b < o := ⟨(lt_succ b).trans, fun l => lt_of_le_of_ne (succ_le_of_lt l) fun e => h ⟨_, e.symm⟩⟩ theorem lt_pred {a b} : a < pred b ↔ succ a < b := by classical exact if h : ∃ a, b = succ a then by let ⟨c, e⟩ := h rw [e, pred_succ, succ_lt_succ_iff] else by simp only [pred, dif_neg h, succ_lt_of_not_succ h] theorem pred_le {a b} : pred a ≤ b ↔ a ≤ succ b := le_iff_le_iff_lt_iff_lt.2 lt_pred @[simp] theorem lift_is_succ {o : Ordinal.{v}} : (∃ a, lift.{u} o = succ a) ↔ ∃ a, o = succ a := ⟨fun ⟨a, h⟩ => let ⟨b, e⟩ := mem_range_lift_of_le <\| show a ≤ lift.{u} o from le_of_lt <\| h.symm ▸ lt_succ a ⟨b, (lift_inj.{u,v}).1 <\| by rw [h, ← e, lift_succ]⟩, fun ⟨a, h⟩ => ⟨lift.{u} a, by simp only [h, lift_succ]⟩⟩ @[simp] theorem lift_pred (o : Ordinal.{v}) : lift.{u} (pred o) = pred (lift.{u} o) := by classical exact if h : ∃ a, o = succ a then by obtain ⟨a, e⟩ := h; simp only [e, pred_succ, lift_succ] else by rw [pred_eq_iff_not_succ.2 h, pred_eq_iff_not_succ.2 (mt lift_is_succ.1 h)] /-! ### Limit ordinals -/ /-- A limit ordinal is an ordinal which is not zero and not a successor. TODO: deprecate this in favor of `Order.IsSuccLimit`. -/ def IsLimit (o : Ordinal) : Prop := IsSuccLimit o theorem isLimit_iff {o} : IsLimit o ↔ o ≠ 0 ∧ IsSuccPrelimit o := by simp [IsLimit, IsSuccLimit] theorem IsLimit.isSuccPrelimit {o} (h : IsLimit o) : IsSuccPrelimit o := IsSuccLimit.isSuccPrelimit h theorem IsLimit.succ_lt {o a : Ordinal} (h : IsLimit o) : a < o → succ a < o := IsSuccLimit.succ_lt h theorem isSuccPrelimit_zero : IsSuccPrelimit (0 : Ordinal) := isSuccPrelimit_bot theorem not_zero_isLimit : ¬IsLimit 0 := not_isSuccLimit_bot theorem not_succ_isLimit (o) : ¬IsLimit (succ o) := not_isSuccLimit_succ o theorem not_succ_of_isLimit {o} (h : IsLimit o) : ¬∃ a, o = succ a \| ⟨a, e⟩ => not_succ_isLimit a (e ▸ h) theorem succ_lt_of_isLimit {o a : Ordinal} (h : IsLimit o) : succ a < o ↔ a < o := IsSuccLimit.succ_lt_iff h theorem le_succ_of_isLimit {o} (h : IsLimit o) {a} : o ≤ succ a ↔ o ≤ a := le_iff_le_iff_lt_iff_lt.2 <\| succ_lt_of_isLimit h theorem limit_le {o} (h : IsLimit o) {a} : o ≤ a ↔ ∀ x < o, x ≤ a := ⟨fun h _x l => l.le.trans h, fun H => (le_succ_of_isLimit h).1 <\| le_of_not_lt fun hn => not_lt_of_le (H _ hn) (lt_succ a)⟩ theorem lt_limit {o} (h : IsLimit o) {a} : a < o ↔ ∃ x < o, a < x := by -- Porting note: `bex_def` is required. simpa only [not_forall₂, not_le, bex_def] using not_congr (@limit_le _ h a) @[simp] theorem lift_isLimit (o : Ordinal.{v}) : IsLimit (lift.{u,v} o) ↔ IsLimit o := liftInitialSeg.isSuccLimit_apply_iff theorem IsLimit.pos {o : Ordinal} (h : IsLimit o) : 0 < o := IsSuccLimit.bot_lt h theorem IsLimit.ne_zero {o : Ordinal} (h : IsLimit o) : o ≠ 0 := h.pos.ne' theorem IsLimit.one_lt {o : Ordinal} (h : IsLimit o) : 1 < o := by simpa only [succ_zero] using h.succ_lt h.pos theorem IsLimit.nat_lt {o : Ordinal} (h : IsLimit o) : ∀ n : ℕ, (n : Ordinal) < o \| 0 => h.pos \| n + 1 => h.succ_lt (IsLimit.nat_lt h n) theorem zero_or_succ_or_limit (o : Ordinal) : o = 0 ∨ (∃ a, o = succ a) ∨ IsLimit o := by simpa [eq_comm] using isMin_or_mem_range_succ_or_isSuccLimit o theorem isLimit_of_not_succ_of_ne_zero {o : Ordinal} (h : ¬∃ a, o = succ a) (h' : o ≠ 0) : IsLimit o := ((zero_or_succ_or_limit o).resolve_left h').resolve_left h -- TODO: this is an iff with `IsSuccPrelimit` theorem IsLimit.sSup_Iio {o : Ordinal} (h : IsLimit o) : sSup (Iio o) = o := by apply (csSup_le' (fun a ha ↦ le_of_lt ha)).antisymm apply le_of_forall_lt intro a ha exact (lt_succ a).trans_le (le_csSup bddAbove_Iio (h.succ_lt ha)) theorem IsLimit.iSup_Iio {o : Ordinal} (h : IsLimit o) : ⨆ a : Iio o, a.1 = o := by rw [← sSup_eq_iSup', h.sSup_Iio] /-- Main induction principle of ordinals: if one can prove a property by induction at successor ordinals and at limit ordinals, then it holds for all ordinals. -/ @[elab_as_elim] def limitRecOn {motive : Ordinal → Sort} (o : Ordinal) (zero : motive 0) (succ : ∀ o, motive o → motive (succ o)) (isLimit : ∀ o, IsLimit o → (∀ o' < o, motive o') → motive o) : motive o := by refine SuccOrder.limitRecOn o (fun a ha ↦ ?_) (fun a _ ↦ succ a) isLimit convert zero simpa using ha @[simp] theorem limitRecOn_zero {motive} (H₁ H₂ H₃) : @limitRecOn motive 0 H₁ H₂ H₃ = H₁ := SuccOrder.limitRecOn_isMin _ _ _ isMin_bot @[simp] theorem limitRecOn_succ {motive} (o H₁ H₂ H₃) : @limitRecOn motive (succ o) H₁ H₂ H₃ = H₂ o (@limitRecOn motive o H₁ H₂ H₃) := SuccOrder.limitRecOn_succ .. @[simp] theorem limitRecOn_limit {motive} (o H₁ H₂ H₃ h) : @limitRecOn motive o H₁ H₂ H₃ = H₃ o h fun x _h => @limitRecOn motive x H₁ H₂ H₃ := SuccOrder.limitRecOn_of_isSuccLimit .. /-- Bounded recursion on ordinals. Similar to `limitRecOn`, with the assumption `o < l` added to all cases. The final term's domain is the ordinals below `l`. -/ @[elab_as_elim] def boundedLimitRecOn {l : Ordinal} (lLim : l.IsLimit) {motive : Iio l → Sort} (o : Iio l) (zero : motive ⟨0, lLim.pos⟩) (succ : (o : Iio l) → motive o → motive ⟨succ o, lLim.succ_lt o.2⟩) (isLimit : (o : Iio l) → IsLimit o → (Π o' < o, motive o') → motive o) : motive o := limitRecOn (motive := fun p ↦ (h : p < l) → motive ⟨p, h⟩) o.1 (fun _ ↦ zero) (fun o ih h ↦ succ ⟨o, _⟩ <\| ih <\| (lt_succ o).trans h) (fun _o ho ih _ ↦ isLimit _ ho fun _o' h ↦ ih _ h _) o.2 @[simp] theorem boundedLimitRec_zero {l} (lLim : l.IsLimit) {motive} (H₁ H₂ H₃) : @boundedLimitRecOn l lLim motive ⟨0, lLim.pos⟩ H₁ H₂ H₃ = H₁ := by rw [boundedLimitRecOn, limitRecOn_zero] @[simp] theorem boundedLimitRec_succ {l} (lLim : l.IsLimit) {motive} (o H₁ H₂ H₃) : @boundedLimitRecOn l lLim motive ⟨succ o.1, lLim.succ_lt o.2⟩ H₁ H₂ H₃ = H₂ o (@boundedLimitRecOn l lLim motive o H₁ H₂ H₃) := by rw [boundedLimitRecOn, limitRecOn_succ] rfl theorem boundedLimitRec_limit {l} (lLim : l.IsLimit) {motive} (o H₁ H₂ H₃ oLim) : @boundedLimitRecOn l lLim motive o H₁ H₂ H₃ = H₃ o oLim (fun x _ ↦ @boundedLimitRecOn l lLim motive x H₁ H₂ H₃) := by rw [boundedLimitRecOn, limitRecOn_limit] rfl instance orderTopToTypeSucc (o : Ordinal) : OrderTop (succ o).toType := @OrderTop.mk _ _ (Top.mk _) le_enum_succ theorem enum_succ_eq_top {o : Ordinal} : enum (α := (succ o).toType) (· < ·) ⟨o, type_toType _ ▸ lt_succ o⟩ = ⊤ := rfl theorem has_succ_of_type_succ_lt {α} {r : α → α → Prop} [wo : IsWellOrder α r] (h : ∀ a < type r, succ a < type r) (x : α) : ∃ y, r x y := by use enum r ⟨succ (typein r x), h _ (typein_lt_type r x)⟩ convert enum_lt_enum.mpr _ · rw [enum_typein] · rw [Subtype.mk_lt_mk, lt_succ_iff] theorem toType_noMax_of_succ_lt {o : Ordinal} (ho : ∀ a < o, succ a < o) : NoMaxOrder o.toType := ⟨has_succ_of_type_succ_lt (type_toType _ ▸ ho)⟩ theorem bounded_singleton {r : α → α → Prop} [IsWellOrder α r] (hr : (type r).IsLimit) (x) : Bounded r {x} := by refine ⟨enum r ⟨succ (typein r x), hr.succ_lt (typein_lt_type r x)⟩, ?_⟩ intro b hb rw [mem_singleton_iff.1 hb] nth_rw 1 [← enum_typein r x] rw [@enum_lt_enum _ r, Subtype.mk_lt_mk] apply lt_succ @[simp] theorem typein_ordinal (o : Ordinal.{u}) : @typein Ordinal (· < ·) _ o = Ordinal.lift.{u + 1} o := by refine Quotient.inductionOn o ?_ rintro ⟨α, r, wo⟩; apply Quotient.sound constructor; refine ((RelIso.preimage Equiv.ulift r).trans (enum r).symm).symm theorem mk_Iio_ordinal (o : Ordinal.{u}) : #(Iio o) = Cardinal.lift.{u + 1} o.card := by rw [lift_card, ← typein_ordinal] rfl /-! ### Normal ordinal functions -/ /-- A normal ordinal function is a strictly increasing function which is order-continuous, i.e., the image `f o` of a limit ordinal `o` is the sup of `f a` for `a < o`. -/ def IsNormal (f : Ordinal → Ordinal) : Prop := (∀ o, f o < f (succ o)) ∧ ∀ o, IsLimit o → ∀ a, f o ≤ a ↔ ∀ b < o, f b ≤ a theorem IsNormal.limit_le {f} (H : IsNormal f) : ∀ {o}, IsLimit o → ∀ {a}, f o ≤ a ↔ ∀ b < o, f b ≤ a := @H.2 theorem IsNormal.limit_lt {f} (H : IsNormal f) {o} (h : IsLimit o) {a} : a < f o ↔ ∃ b < o, a < f b := not_iff_not.1 <\| by simpa only [exists_prop, not_exists, not_and, not_lt] using H.2 _ h a theorem IsNormal.strictMono {f} (H : IsNormal f) : StrictMono f := fun a b => limitRecOn b (Not.elim (not_lt_of_le <\| Ordinal.zero_le _)) (fun _b IH h => (lt_or_eq_of_le (le_of_lt_succ h)).elim (fun h => (IH h).trans (H.1 _)) fun e => e ▸ H.1 _) fun _b l _IH h => lt_of_lt_of_le (H.1 a) ((H.2 _ l _).1 le_rfl _ (l.succ_lt h)) theorem IsNormal.monotone {f} (H : IsNormal f) : Monotone f := H.strictMono.monotone theorem isNormal_iff_strictMono_limit (f : Ordinal → Ordinal) : IsNormal f ↔ StrictMono f ∧ ∀ o, IsLimit o → ∀ a, (∀ b < o, f b ≤ a) → f o ≤ a := ⟨fun hf => ⟨hf.strictMono, fun a ha c => (hf.2 a ha c).2⟩, fun ⟨hs, hl⟩ => ⟨fun a => hs (lt_succ a), fun a ha c => ⟨fun hac _b hba => ((hs hba).trans_le hac).le, hl a ha c⟩⟩⟩ theorem IsNormal.lt_iff {f} (H : IsNormal f) {a b} : f a < f b ↔ a < b := StrictMono.lt_iff_lt <\| H.strictMono theorem IsNormal.le_iff {f} (H : IsNormal f) {a b} : f a ≤ f b ↔ a ≤ b := le_iff_le_iff_lt_iff_lt.2 H.lt_iff theorem IsNormal.inj {f} (H : IsNormal f) {a b} : f a = f b ↔ a = b := by simp only [le_antisymm_iff, H.le_iff] theorem IsNormal.id_le {f} (H : IsNormal f) : id ≤ f := H.strictMono.id_le theorem IsNormal.le_apply {f} (H : IsNormal f) {a} : a ≤ f a := H.strictMono.le_apply theorem IsNormal.le_iff_eq {f} (H : IsNormal f) {a} : f a ≤ a ↔ f a = a := H.le_apply.le_iff_eq theorem IsNormal.le_set {f o} (H : IsNormal f) (p : Set Ordinal) (p0 : p.Nonempty) (b) (H₂ : ∀ o, b ≤ o ↔ ∀ a ∈ p, a ≤ o) : f b ≤ o ↔ ∀ a ∈ p, f a ≤ o := ⟨fun h _ pa => (H.le_iff.2 ((H₂ _).1 le_rfl _ pa)).trans h, fun h => by induction b using limitRecOn with \| zero => obtain ⟨x, px⟩ := p0 have := Ordinal.le_zero.1 ((H₂ _).1 (Ordinal.zero_le _) _ px) rw [this] at px exact h _ px \| succ S _ => rcases not_forall₂.1 (mt (H₂ S).2 <\| (lt_succ S).not_le) with ⟨a, h₁, h₂⟩ exact (H.le_iff.2 <\| succ_le_of_lt <\| not_le.1 h₂).trans (h _ h₁) \| isLimit S L _ => refine (H.2 _ L _).2 fun a h' => ?_ rcases not_forall₂.1 (mt (H₂ a).2 h'.not_le) with ⟨b, h₁, h₂⟩ exact (H.le_iff.2 <\| (not_le.1 h₂).le).trans (h _ h₁)⟩ theorem IsNormal.le_set' {f o} (H : IsNormal f) (p : Set α) (p0 : p.Nonempty) (g : α → Ordinal) (b) (H₂ : ∀ o, b ≤ o ↔ ∀ a ∈ p, g a ≤ o) : f b ≤ o ↔ ∀ a ∈ p, f (g a) ≤ o := by simpa [H₂] using H.le_set (g '' p) (p0.image g) b theorem IsNormal.refl : IsNormal id := ⟨lt_succ, fun _o l _a => Ordinal.limit_le l⟩ theorem IsNormal.trans {f g} (H₁ : IsNormal f) (H₂ : IsNormal g) : IsNormal (f ∘ g) := ⟨fun _x => H₁.lt_iff.2 (H₂.1 _), fun o l _a => H₁.le_set' (· < o) ⟨0, l.pos⟩ g _ fun _c => H₂.2 _ l _⟩ theorem IsNormal.isLimit {f} (H : IsNormal f) {o} (ho : IsLimit o) : IsLimit (f o) := by rw [isLimit_iff, isSuccPrelimit_iff_succ_lt] use (H.lt_iff.2 ho.pos).ne_bot intro a ha obtain ⟨b, hb, hab⟩ := (H.limit_lt ho).1 ha rw [← succ_le_iff] at hab apply hab.trans_lt rwa [H.lt_iff] theorem add_le_of_limit {a b c : Ordinal} (h : IsLimit b) : a + b ≤ c ↔ ∀ b' < b, a + b' ≤ c := ⟨fun h _ l => (add_le_add_left l.le _).trans h, fun H => le_of_not_lt <\| by -- Porting note: `induction` tactics are required because of the parser bug. induction a using inductionOn with \| H α r => induction b using inductionOn with \| H β s => intro l suffices ∀ x : β, Sum.Lex r s (Sum.inr x) (enum _ ⟨_, l⟩) by -- Porting note: `revert` & `intro` is required because `cases'` doesn't replace -- `enum _ _ l` in `this`. revert this; rcases enum _ ⟨_, l⟩ with x \| x <;> intro this · cases this (enum s ⟨0, h.pos⟩) · exact irrefl _ (this _) intro x rw [← typein_lt_typein (Sum.Lex r s), typein_enum] have := H _ (h.succ_lt (typein_lt_type s x)) rw [add_succ, succ_le_iff] at this refine (RelEmbedding.ofMonotone (fun a => ?_) fun a b => ?_).ordinal_type_le.trans_lt this · rcases a with ⟨a \| b, h⟩ · exact Sum.inl a · exact Sum.inr ⟨b, by cases h; assumption⟩ · rcases a with ⟨a \| a, h₁⟩ <;> rcases b with ⟨b \| b, h₂⟩ <;> cases h₁ <;> cases h₂ <;> rintro ⟨⟩ <;> constructor <;> assumption⟩ theorem isNormal_add_right (a : Ordinal) : IsNormal (a + ·) := ⟨fun b => (add_lt_add_iff_left a).2 (lt_succ b), fun _b l _c => add_le_of_limit l⟩ theorem isLimit_add (a) {b} : IsLimit b → IsLimit (a + b) := (isNormal_add_right a).isLimit alias IsLimit.add := isLimit_add /-! ### Subtraction on ordinals -/ /-- The set in the definition of subtraction is nonempty. -/ private theorem sub_nonempty {a b : Ordinal} : { o \| a ≤ b + o }.Nonempty := ⟨a, le_add_left _ _⟩ /-- `a - b` is the unique ordinal satisfying `b + (a - b) = a` when `b ≤ a`. -/ instance sub : Sub Ordinal := ⟨fun a b => sInf { o \| a ≤ b + o }⟩ theorem le_add_sub (a b : Ordinal) : a ≤ b + (a - b) := csInf_mem sub_nonempty theorem sub_le {a b c : Ordinal} : a - b ≤ c ↔ a ≤ b + c := ⟨fun h => (le_add_sub a b).trans (add_le_add_left h _), fun h => csInf_le' h⟩ theorem lt_sub {a b c : Ordinal} : a < b - c ↔ c + a < b := lt_iff_lt_of_le_iff_le sub_le theorem add_sub_cancel (a b : Ordinal) : a + b - a = b := le_antisymm (sub_le.2 <\| le_rfl) ((add_le_add_iff_left a).1 <\| le_add_sub _ _) theorem sub_eq_of_add_eq {a b c : Ordinal} (h : a + b = c) : c - a = b := h ▸ add_sub_cancel _ _ theorem sub_le_self (a b : Ordinal) : a - b ≤ a := sub_le.2 <\| le_add_left _ _ protected theorem add_sub_cancel_of_le {a b : Ordinal} (h : b ≤ a) : b + (a - b) = a := (le_add_sub a b).antisymm' (by rcases zero_or_succ_or_limit (a - b) with (e \| ⟨c, e⟩ \| l) · simp only [e, add_zero, h] · rw [e, add_succ, succ_le_iff, ← lt_sub, e] exact lt_succ c · exact (add_le_of_limit l).2 fun c l => (lt_sub.1 l).le) theorem le_sub_of_le {a b c : Ordinal} (h : b ≤ a) : c ≤ a - b ↔ b + c ≤ a := by rw [← add_le_add_iff_left b, Ordinal.add_sub_cancel_of_le h] theorem sub_lt_of_le {a b c : Ordinal} (h : b ≤ a) : a - b < c ↔ a < b + c := lt_iff_lt_of_le_iff_le (le_sub_of_le h) instance existsAddOfLE : ExistsAddOfLE Ordinal := ⟨fun h => ⟨_, (Ordinal.add_sub_cancel_of_le h).symm⟩⟩ @[simp] theorem sub_zero (a : Ordinal) : a - 0 = a := by simpa only [zero_add] using add_sub_cancel 0 a @[simp] theorem zero_sub (a : Ordinal) : 0 - a = 0 := by rw [← Ordinal.le_zero]; apply sub_le_self @[simp] theorem sub_self (a : Ordinal) : a - a = 0 := by simpa only [add_zero] using add_sub_cancel a 0 protected theorem sub_eq_zero_iff_le {a b : Ordinal} : a - b = 0 ↔ a ≤ b := ⟨fun h => by simpa only [h, add_zero] using le_add_sub a b, fun h => by rwa [← Ordinal.le_zero, sub_le, add_zero]⟩ protected theorem sub_ne_zero_iff_lt {a b : Ordinal} : a - b ≠ 0 ↔ b < a := by simpa using Ordinal.sub_eq_zero_iff_le.not theorem sub_sub (a b c : Ordinal) : a - b - c = a - (b + c) := eq_of_forall_ge_iff fun d => by rw [sub_le, sub_le, sub_le, add_assoc] @[simp] theorem add_sub_add_cancel (a b c : Ordinal) : a + b - (a + c) = b - c := by rw [← sub_sub, add_sub_cancel] theorem le_sub_of_add_le {a b c : Ordinal} (h : b + c ≤ a) : c ≤ a - b := by rw [← add_le_add_iff_left b] exact h.trans (le_add_sub a b) theorem sub_lt_of_lt_add {a b c : Ordinal} (h : a < b + c) (hc : 0 < c) : a - b < c := by obtain hab \| hba := lt_or_le a b · rwa [Ordinal.sub_eq_zero_iff_le.2 hab.le] · rwa [sub_lt_of_le hba] theorem lt_add_iff {a b c : Ordinal} (hc : c ≠ 0) : a < b + c ↔ ∃ d < c, a ≤ b + d := by use fun h ↦ ⟨_, sub_lt_of_lt_add h hc.bot_lt, le_add_sub a b⟩ rintro ⟨d, hd, ha⟩ exact ha.trans_lt (add_lt_add_left hd b) theorem add_le_iff {a b c : Ordinal} (hb : b ≠ 0) : a + b ≤ c ↔ ∀ d < b, a + d < c := by simpa using (lt_add_iff hb).not @[deprecated add_le_iff (since := "2024-12-08")] theorem add_le_of_forall_add_lt {a b c : Ordinal} (hb : 0 < b) (h : ∀ d < b, a + d < c) : a + b ≤ c := (add_le_iff hb.ne').2 h theorem isLimit_sub {a b} (ha : IsLimit a) (h : b < a) : IsLimit (a - b) := by rw [isLimit_iff, Ordinal.sub_ne_zero_iff_lt, isSuccPrelimit_iff_succ_lt] refine ⟨h, fun c hc ↦ ?_⟩ rw [lt_sub] at hc ⊢ rw [add_succ] exact ha.succ_lt hc /-! ### Multiplication of ordinals -/ /-- The multiplication of ordinals `o₁` and `o₂` is the (well founded) lexicographic order on `o₂ × o₁`. -/ instance monoid : Monoid Ordinal.{u} where mul a b := Quotient.liftOn₂ a b (fun ⟨α, r, _⟩ ⟨β, s, _⟩ => ⟦⟨β × α, Prod.Lex s r, inferInstance⟩⟧ : WellOrder → WellOrder → Ordinal) fun ⟨_, _, _⟩ _ _ _ ⟨f⟩ ⟨g⟩ => Quot.sound ⟨RelIso.prodLexCongr g f⟩ one := 1 mul_assoc a b c := Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ => Eq.symm <\| Quotient.sound ⟨⟨prodAssoc _ _ _, @fun a b => by rcases a with ⟨⟨a₁, a₂⟩, a₃⟩ rcases b with ⟨⟨b₁, b₂⟩, b₃⟩ simp [Prod.lex_def, and_or_left, or_assoc, and_assoc]⟩⟩ mul_one a := inductionOn a fun α r _ => Quotient.sound ⟨⟨punitProd _, @fun a b => by rcases a with ⟨⟨⟨⟩⟩, a⟩; rcases b with ⟨⟨⟨⟩⟩, b⟩ simp only [Prod.lex_def, EmptyRelation, false_or] simp only [eq_self_iff_true, true_and] rfl⟩⟩ one_mul a := inductionOn a fun α r _ => Quotient.sound ⟨⟨prodPUnit _, @fun a b => by rcases a with ⟨a, ⟨⟨⟩⟩⟩; rcases b with ⟨b, ⟨⟨⟩⟩⟩ simp only [Prod.lex_def, EmptyRelation, and_false, or_false] rfl⟩⟩ @[simp] theorem type_prod_lex {α β : Type u} (r : α → α → Prop) (s : β → β → Prop) [IsWellOrder α r] [IsWellOrder β s] : type (Prod.Lex s r) = type r type s := rfl private theorem mul_eq_zero' {a b : Ordinal} : a * b = 0 ↔ a = 0 ∨ b = 0 := inductionOn a fun α _ _ => inductionOn b fun β _ _ => by simp_rw [← type_prod_lex, type_eq_zero_iff_isEmpty] rw [or_comm] exact isEmpty_prod instance monoidWithZero : MonoidWithZero Ordinal := { Ordinal.monoid with zero := 0 mul_zero := fun _a => mul_eq_zero'.2 <\| Or.inr rfl zero_mul := fun _a => mul_eq_zero'.2 <\| Or.inl rfl } instance noZeroDivisors : NoZeroDivisors Ordinal := ⟨fun {_ _} => mul_eq_zero'.1⟩ @[simp] theorem lift_mul (a b : Ordinal.{v}) : lift.{u} (a * b) = lift.{u} a * lift.{u} b := Quotient.inductionOn₂ a b fun ⟨_α, _r, _⟩ ⟨_β, _s, _⟩ => Quotient.sound ⟨(RelIso.preimage Equiv.ulift _).trans (RelIso.prodLexCongr (RelIso.preimage Equiv.ulift _) (RelIso.preimage Equiv.ulift _)).symm⟩ @[simp] theorem card_mul (a b) : card (a * b) = card a * card b := Quotient.inductionOn₂ a b fun ⟨α, _r, _⟩ ⟨β, _s, _⟩ => mul_comm #β #α instance leftDistribClass : LeftDistribClass Ordinal.{u} := ⟨fun a b c => Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ => Quotient.sound ⟨⟨sumProdDistrib _ _ _, by rintro ⟨a₁ \| a₁, a₂⟩ ⟨b₁ \| b₁, b₂⟩ <;> simp only [Prod.lex_def, Sum.lex_inl_inl, Sum.Lex.sep, Sum.lex_inr_inl, Sum.lex_inr_inr, sumProdDistrib_apply_left, sumProdDistrib_apply_right, reduceCtorEq] <;> -- Porting note: `Sum.inr.inj_iff` is required. simp only [Sum.inl.inj_iff, Sum.inr.inj_iff, true_or, false_and, false_or]⟩⟩⟩ theorem mul_succ (a b : Ordinal) : a * succ b = a * b + a := mul_add_one a b instance mulLeftMono : MulLeftMono Ordinal.{u} := ⟨fun c a b => Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ ⟨f⟩ => by refine (RelEmbedding.ofMonotone (fun a : α × γ => (f a.1, a.2)) fun a b h => ?_).ordinal_type_le obtain ⟨-, -, h'⟩ \| ⟨-, h'⟩ := h · exact Prod.Lex.left _ _ (f.toRelEmbedding.map_rel_iff.2 h') · exact Prod.Lex.right _ h'⟩ instance mulRightMono : MulRightMono Ordinal.{u} := ⟨fun c a b => Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ ⟨f⟩ => by refine (RelEmbedding.ofMonotone (fun a : γ × α => (a.1, f a.2)) fun a b h => ?_).ordinal_type_le obtain ⟨-, -, h'⟩ \| ⟨-, h'⟩ := h · exact Prod.Lex.left _ _ h' · exact Prod.Lex.right _ (f.toRelEmbedding.map_rel_iff.2 h')⟩ theorem le_mul_left (a : Ordinal) {b : Ordinal} (hb : 0 < b) : a ≤ a * b := by convert mul_le_mul_left' (one_le_iff_pos.2 hb) a rw [mul_one a] theorem le_mul_right (a : Ordinal) {b : Ordinal} (hb : 0 < b) : a ≤ b * a := by convert mul_le_mul_right' (one_le_iff_pos.2 hb) a rw [one_mul a] private theorem mul_le_of_limit_aux {α β r s} [IsWellOrder α r] [IsWellOrder β s] {c} (h : IsLimit (type s)) (H : ∀ b' < type s, type r * b' ≤ c) (l : c < type r * type s) : False := by suffices ∀ a b, Prod.Lex s r (b, a) (enum _ ⟨_, l⟩) by obtain ⟨b, a⟩ := enum _ ⟨_, l⟩ exact irrefl _ (this _ _) intro a b rw [← typein_lt_typein (Prod.Lex s r), typein_enum] have := H _ (h.succ_lt (typein_lt_type s b)) rw [mul_succ] at this have := ((add_lt_add_iff_left _).2 (typein_lt_type _ a)).trans_le this refine (RelEmbedding.ofMonotone (fun a => ?_) fun a b => ?_).ordinal_type_le.trans_lt this · rcases a with ⟨⟨b', a'⟩, h⟩ by_cases e : b = b' · refine Sum.inr ⟨a', ?_⟩ subst e obtain ⟨-, -, h⟩ \| ⟨-, h⟩ := h · exact (irrefl _ h).elim · exact h · refine Sum.inl (⟨b', ?_⟩, a') obtain ⟨-, -, h⟩ \| ⟨e, h⟩ := h · exact h · exact (e rfl).elim · rcases a with ⟨⟨b₁, a₁⟩, h₁⟩ rcases b with ⟨⟨b₂, a₂⟩, h₂⟩ intro h by_cases e₁ : b = b₁ <;> by_cases e₂ : b = b₂ · substs b₁ b₂ simpa only [subrel_val, Prod.lex_def, @irrefl _ s _ b, true_and, false_or, eq_self_iff_true, dif_pos, Sum.lex_inr_inr] using h · subst b₁ simp only [subrel_val, Prod.lex_def, e₂, Prod.lex_def, dif_pos, subrel_val, eq_self_iff_true, or_false, dif_neg, not_false_iff, Sum.lex_inr_inl, false_and] at h ⊢ obtain ⟨-, -, h₂_h⟩ \| e₂ := h₂ <;> [exact asymm h h₂_h; exact e₂ rfl] · simp [e₂, dif_neg e₁, show b₂ ≠ b₁ from e₂ ▸ e₁] · simpa only [dif_neg e₁, dif_neg e₂, Prod.lex_def, subrel_val, Subtype.mk_eq_mk, Sum.lex_inl_inl] using h theorem mul_le_of_limit {a b c : Ordinal} (h : IsLimit b) : a * b ≤ c ↔ ∀ b' < b, a * b' ≤ c := ⟨fun h _ l => (mul_le_mul_left' l.le _).trans h, fun H => -- Porting note: `induction` tactics are required because of the parser bug. le_of_not_lt <\| by induction a using inductionOn with \| H α r => induction b using inductionOn with \| H β s => exact mul_le_of_limit_aux h H⟩ theorem isNormal_mul_right {a : Ordinal} (h : 0 < a) : IsNormal (a * ·) := -- Porting note (https://github.com/leanprover-community/mathlib4/issues/12129): additional beta reduction needed ⟨fun b => by beta_reduce rw [mul_succ] simpa only [add_zero] using (add_lt_add_iff_left (a * b)).2 h, fun _ l _ => mul_le_of_limit l⟩ theorem lt_mul_of_limit {a b c : Ordinal} (h : IsLimit c) : a < b * c ↔ ∃ c' < c, a < b * c' := by -- Porting note: `bex_def` is required. simpa only [not_forall₂, not_le, bex_def] using not_congr (@mul_le_of_limit b c a h) theorem mul_lt_mul_iff_left {a b c : Ordinal} (a0 : 0 < a) : a * b < a * c ↔ b < c := (isNormal_mul_right a0).lt_iff theorem mul_le_mul_iff_left {a b c : Ordinal} (a0 : 0 < a) : a * b ≤ a * c ↔ b ≤ c := (isNormal_mul_right a0).le_iff theorem mul_lt_mul_of_pos_left {a b c : Ordinal} (h : a < b) (c0 : 0 < c) : c * a < c * b := (mul_lt_mul_iff_left c0).2 h theorem mul_pos {a b : Ordinal} (h₁ : 0 < a) (h₂ : 0 < b) : 0 < a * b := by simpa only [mul_zero] using mul_lt_mul_of_pos_left h₂ h₁ theorem mul_ne_zero {a b : Ordinal} : a ≠ 0 → b ≠ 0 → a * b ≠ 0 := by simpa only [Ordinal.pos_iff_ne_zero] using mul_pos theorem le_of_mul_le_mul_left {a b c : Ordinal} (h : c * a ≤ c * b) (h0 : 0 < c) : a ≤ b := le_imp_le_of_lt_imp_lt (fun h' => mul_lt_mul_of_pos_left h' h0) h theorem mul_right_inj {a b c : Ordinal} (a0 : 0 < a) : a * b = a * c ↔ b = c := (isNormal_mul_right a0).inj theorem isLimit_mul {a b : Ordinal} (a0 : 0 < a) : IsLimit b → IsLimit (a * b) := (isNormal_mul_right a0).isLimit theorem isLimit_mul_left {a b : Ordinal} (l : IsLimit a) (b0 : 0 < b) : IsLimit (a * b) := by rcases zero_or_succ_or_limit b with (rfl \| ⟨b, rfl⟩ \| lb) · exact b0.false.elim · rw [mul_succ] exact isLimit_add _ l · exact isLimit_mul l.pos lb theorem smul_eq_mul : ∀ (n : ℕ) (a : Ordinal), n • a = a * n \| 0, a => by rw [zero_nsmul, Nat.cast_zero, mul_zero] \| n + 1, a => by rw [succ_nsmul, Nat.cast_add, mul_add, Nat.cast_one, mul_one, smul_eq_mul n] private theorem add_mul_limit_aux {a b c : Ordinal} (ba : b + a = a) (l : IsLimit c) (IH : ∀ c' < c, (a + b) * succ c' = a * succ c' + b) : (a + b) * c = a * c := le_antisymm ((mul_le_of_limit l).2 fun c' h => by apply (mul_le_mul_left' (le_succ c') _).trans rw [IH _ h] apply (add_le_add_left _ _).trans · rw [← mul_succ] exact mul_le_mul_left' (succ_le_of_lt <\| l.succ_lt h) _ · rw [← ba] exact le_add_right _ _) (mul_le_mul_right' (le_add_right _ _) _) theorem add_mul_succ {a b : Ordinal} (c) (ba : b + a = a) : (a + b) * succ c = a * succ c + b := by induction c using limitRecOn with \| zero => simp only [succ_zero, mul_one] \| succ c IH => rw [mul_succ, IH, ← add_assoc, add_assoc _ b, ba, ← mul_succ] \| isLimit c l IH => rw [mul_succ, add_mul_limit_aux ba l IH, mul_succ, add_assoc] theorem add_mul_limit {a b c : Ordinal} (ba : b + a = a) (l : IsLimit c) : (a + b) * c = a * c := add_mul_limit_aux ba l fun c' _ => add_mul_succ c' ba /-! ### Division on ordinals -/ /-- The set in the definition of division is nonempty. -/ private theorem div_nonempty {a b : Ordinal} (h : b ≠ 0) : { o \| a < b * succ o }.Nonempty := ⟨a, (succ_le_iff (a := a) (b := b * succ a)).1 <\| by simpa only [succ_zero, one_mul] using mul_le_mul_right' (succ_le_of_lt (Ordinal.pos_iff_ne_zero.2 h)) (succ a)⟩ /-- `a / b` is the unique ordinal `o` satisfying `a = b * o + o'` with `o' < b`. -/ instance div : Div Ordinal := ⟨fun a b => if b = 0 then 0 else sInf { o \| a < b * succ o }⟩ @[simp] theorem div_zero (a : Ordinal) : a / 0 = 0 := dif_pos rfl private theorem div_def (a) {b : Ordinal} (h : b ≠ 0) : a / b = sInf { o \| a < b * succ o } := dif_neg h theorem lt_mul_succ_div (a) {b : Ordinal} (h : b ≠ 0) : a < b * succ (a / b) := by rw [div_def a h]; exact csInf_mem (div_nonempty h) theorem lt_mul_div_add (a) {b : Ordinal} (h : b ≠ 0) : a < b * (a / b) + b := by simpa only [mul_succ] using lt_mul_succ_div a h theorem div_le {a b c : Ordinal} (b0 : b ≠ 0) : a / b ≤ c ↔ a < b * succ c := ⟨fun h => (lt_mul_succ_div a b0).trans_le (mul_le_mul_left' (succ_le_succ_iff.2 h) _), fun h => by rw [div_def a b0]; exact csInf_le' h⟩ theorem lt_div {a b c : Ordinal} (h : c ≠ 0) : a < b / c ↔ c * succ a ≤ b := by rw [← not_le, div_le h, not_lt] theorem div_pos {b c : Ordinal} (h : c ≠ 0) : 0 < b / c ↔ c ≤ b := by simp [lt_div h] theorem le_div {a b c : Ordinal} (c0 : c ≠ 0) : a ≤ b / c ↔ c * a ≤ b := by induction a using limitRecOn with \| zero => simp only [mul_zero, Ordinal.zero_le] \| succ _ _ => rw [succ_le_iff, lt_div c0] \| isLimit _ h₁ h₂ => revert h₁ h₂ simp +contextual only [mul_le_of_limit, limit_le, forall_true_iff] theorem div_lt {a b c : Ordinal} (b0 : b ≠ 0) : a / b < c ↔ a < b * c := lt_iff_lt_of_le_iff_le <\| le_div b0 theorem div_le_of_le_mul {a b c : Ordinal} (h : a ≤ b * c) : a / b ≤ c := if b0 : b = 0 then by simp only [b0, div_zero, Ordinal.zero_le] else (div_le b0).2 <\| h.trans_lt <\| mul_lt_mul_of_pos_left (lt_succ c) (Ordinal.pos_iff_ne_zero.2 b0) theorem mul_lt_of_lt_div {a b c : Ordinal} : a < b / c → c * a < b := lt_imp_lt_of_le_imp_le div_le_of_le_mul @[simp] theorem zero_div (a : Ordinal) : 0 / a = 0 := Ordinal.le_zero.1 <\| div_le_of_le_mul <\| Ordinal.zero_le _ theorem mul_div_le (a b : Ordinal) : b * (a / b) ≤ a := if b0 : b = 0 then by simp only [b0, zero_mul, Ordinal.zero_le] else (le_div b0).1 le_rfl theorem div_le_left {a b : Ordinal} (h : a ≤ b) (c : Ordinal) : a / c ≤ b / c := by obtain rfl \| hc := eq_or_ne c 0 · rw [div_zero, div_zero] · rw [le_div hc] exact (mul_div_le a c).trans h theorem mul_add_div (a) {b : Ordinal} (b0 : b ≠ 0) (c) : (b * a + c) / b = a + c / b := by apply le_antisymm · apply (div_le b0).2 rw [mul_succ, mul_add, add_assoc, add_lt_add_iff_left] apply lt_mul_div_add _ b0 · rw [le_div b0, mul_add, add_le_add_iff_left] apply mul_div_le theorem div_eq_zero_of_lt {a b : Ordinal} (h : a < b) : a / b = 0 := by rw [← Ordinal.le_zero, div_le <\| Ordinal.pos_iff_ne_zero.1 <\| (Ordinal.zero_le _).trans_lt h] simpa only [succ_zero, mul_one] using h @[simp]	theorem mul_div_cancel (a) {b : Ordinal} (b0 : b ≠ 0) : b * a / b = a := by simpa only [add_zero, zero_div] using mul_add_div a b0 0	Mathlib/SetTheory/Ordinal/Arithmetic.lean	889	891
/- Copyright (c) 2021 Julian Kuelshammer. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Julian Kuelshammer -/ import Mathlib.GroupTheory.OrderOfElement import Mathlib.Algebra.GCDMonoid.Finset import Mathlib.Algebra.GCDMonoid.Nat import Mathlib.Data.Nat.Factorization.Basic import Mathlib.Tactic.Peel import Mathlib.Algebra.Order.BigOperators.Ring.Finset /-! # Exponent of a group This file defines the exponent of a group, or more generally a monoid. For a group `G` it is defined to be the minimal `n≥1` such that `g ^ n = 1` for all `g ∈ G`. For a finite group `G`, it is equal to the lowest common multiple of the order of all elements of the group `G`. ## Main definitions * `Monoid.ExponentExists` is a predicate on a monoid `G` saying that there is some positive `n` such that `g ^ n = 1` for all `g ∈ G`. * `Monoid.exponent` defines the exponent of a monoid `G` as the minimal positive `n` such that `g ^ n = 1` for all `g ∈ G`, by convention it is `0` if no such `n` exists. * `AddMonoid.ExponentExists` the additive version of `Monoid.ExponentExists`. * `AddMonoid.exponent` the additive version of `Monoid.exponent`. ## Main results * `Monoid.lcm_order_eq_exponent`: For a finite left cancel monoid `G`, the exponent is equal to the `Finset.lcm` of the order of its elements. * `Monoid.exponent_eq_iSup_orderOf(')`: For a commutative cancel monoid, the exponent is equal to `⨆ g : G, orderOf g` (or zero if it has any order-zero elements). * `Monoid.exponent_pi` and `Monoid.exponent_prod`: The exponent of a finite product of monoids is the least common multiple (`Finset.lcm` and `lcm`, respectively) of the exponents of the constituent monoids. * `MonoidHom.exponent_dvd`: If `f : M₁ →⋆ M₂` is surjective, then the exponent of `M₂` divides the exponent of `M₁`. ## TODO * Refactor the characteristic of a ring to be the exponent of its underlying additive group. -/ universe u variable {G : Type u} namespace Monoid section Monoid variable (G) [Monoid G] /-- A predicate on a monoid saying that there is a positive integer `n` such that `g ^ n = 1` for all `g`. -/ @[to_additive "A predicate on an additive monoid saying that there is a positive integer `n` such\n that `n • g = 0` for all `g`."] def ExponentExists := ∃ n, 0 < n ∧ ∀ g : G, g ^ n = 1 open scoped Classical in /-- The exponent of a group is the smallest positive integer `n` such that `g ^ n = 1` for all `g ∈ G` if it exists, otherwise it is zero by convention. -/ @[to_additive "The exponent of an additive group is the smallest positive integer `n` such that\n `n • g = 0` for all `g ∈ G` if it exists, otherwise it is zero by convention."] noncomputable def exponent := if h : ExponentExists G then Nat.find h else 0 variable {G} @[simp] theorem _root_.AddMonoid.exponent_additive : AddMonoid.exponent (Additive G) = exponent G := rfl @[simp] theorem exponent_multiplicative {G : Type} [AddMonoid G] : exponent (Multiplicative G) = AddMonoid.exponent G := rfl open MulOpposite in @[to_additive (attr := simp)] theorem _root_.MulOpposite.exponent : exponent (MulOpposite G) = exponent G := by simp only [Monoid.exponent, ExponentExists] congr! all_goals exact ⟨(op_injective <\| · <\| op ·), (unop_injective <\| · <\| unop ·)⟩ @[to_additive] theorem ExponentExists.isOfFinOrder (h : ExponentExists G) {g : G} : IsOfFinOrder g := isOfFinOrder_iff_pow_eq_one.mpr <\| by peel 2 h; exact this g @[to_additive] theorem ExponentExists.orderOf_pos (h : ExponentExists G) (g : G) : 0 < orderOf g := h.isOfFinOrder.orderOf_pos @[to_additive] theorem exponent_ne_zero : exponent G ≠ 0 ↔ ExponentExists G := by rw [exponent] split_ifs with h · simp [h, @not_lt_zero' ℕ] --if this isn't done this way, `to_additive` freaks · tauto @[to_additive] protected alias ⟨_, ExponentExists.exponent_ne_zero⟩ := exponent_ne_zero @[to_additive] theorem exponent_pos : 0 < exponent G ↔ ExponentExists G := pos_iff_ne_zero.trans exponent_ne_zero @[to_additive] protected alias ⟨_, ExponentExists.exponent_pos⟩ := exponent_pos @[to_additive] theorem exponent_eq_zero_iff : exponent G = 0 ↔ ¬ExponentExists G := exponent_ne_zero.not_right @[to_additive exponent_eq_zero_addOrder_zero] theorem exponent_eq_zero_of_order_zero {g : G} (hg : orderOf g = 0) : exponent G = 0 := exponent_eq_zero_iff.mpr fun h ↦ h.orderOf_pos g \|>.ne' hg /-- The exponent is zero iff for all nonzero `n`, one can find a `g` such that `g ^ n ≠ 1`. -/ @[to_additive "The exponent is zero iff for all nonzero `n`, one can find a `g` such that `n • g ≠ 0`."] theorem exponent_eq_zero_iff_forall : exponent G = 0 ↔ ∀ n > 0, ∃ g : G, g ^ n ≠ 1 := by rw [exponent_eq_zero_iff, ExponentExists] push_neg rfl @[to_additive exponent_nsmul_eq_zero] theorem pow_exponent_eq_one (g : G) : g ^ exponent G = 1 := by classical by_cases h : ExponentExists G · simp_rw [exponent, dif_pos h] exact (Nat.find_spec h).2 g · simp_rw [exponent, dif_neg h, pow_zero] @[to_additive] theorem pow_eq_mod_exponent {n : ℕ} (g : G) : g ^ n = g ^ (n % exponent G) := calc g ^ n = g ^ (n % exponent G + exponent G (n / exponent G)) := by rw [Nat.mod_add_div] _ = g ^ (n % exponent G) := by simp [pow_add, pow_mul, pow_exponent_eq_one] @[to_additive] theorem exponent_pos_of_exists (n : ℕ) (hpos : 0 < n) (hG : ∀ g : G, g ^ n = 1) : 0 < exponent G := ExponentExists.exponent_pos ⟨n, hpos, hG⟩ @[to_additive] theorem exponent_min' (n : ℕ) (hpos : 0 < n) (hG : ∀ g : G, g ^ n = 1) : exponent G ≤ n := by classical rw [exponent, dif_pos] · apply Nat.find_min' exact ⟨hpos, hG⟩ · exact ⟨n, hpos, hG⟩ @[to_additive] theorem exponent_min (m : ℕ) (hpos : 0 < m) (hm : m < exponent G) : ∃ g : G, g ^ m ≠ 1 := by by_contra! h have hcon : exponent G ≤ m := exponent_min' m hpos h omega @[to_additive AddMonoid.exp_eq_one_iff] theorem exp_eq_one_iff : exponent G = 1 ↔ Subsingleton G := by refine ⟨fun eq_one => ⟨fun a b => ?a_eq_b⟩, fun h => le_antisymm ?le ?ge⟩ · rw [← pow_one a, ← pow_one b, ← eq_one, Monoid.pow_exponent_eq_one, Monoid.pow_exponent_eq_one] · apply exponent_min' _ Nat.one_pos simp [eq_iff_true_of_subsingleton] · apply Nat.succ_le_of_lt apply exponent_pos_of_exists 1 Nat.one_pos simp [eq_iff_true_of_subsingleton] @[to_additive (attr := simp) AddMonoid.exp_eq_one_of_subsingleton] theorem exp_eq_one_of_subsingleton [hs : Subsingleton G] : exponent G = 1 := exp_eq_one_iff.mpr hs @[to_additive addOrder_dvd_exponent] theorem order_dvd_exponent (g : G) : orderOf g ∣ exponent G := orderOf_dvd_of_pow_eq_one <\| pow_exponent_eq_one g @[to_additive] theorem orderOf_le_exponent (h : ExponentExists G) (g : G) : orderOf g ≤ exponent G := Nat.le_of_dvd h.exponent_pos (order_dvd_exponent g) @[to_additive] theorem exponent_dvd_iff_forall_pow_eq_one {n : ℕ} : exponent G ∣ n ↔ ∀ g : G, g ^ n = 1 := by rcases n.eq_zero_or_pos with (rfl \| hpos) · simp constructor · intro h g rw [Nat.dvd_iff_mod_eq_zero] at h rw [pow_eq_mod_exponent, h, pow_zero] · intro hG by_contra h rw [Nat.dvd_iff_mod_eq_zero, ← Ne, ← pos_iff_ne_zero] at h have h₂ : n % exponent G < exponent G := Nat.mod_lt _ (exponent_pos_of_exists n hpos hG) have h₃ : exponent G ≤ n % exponent G := by apply exponent_min' _ h simp_rw [← pow_eq_mod_exponent] exact hG exact h₂.not_le h₃ @[to_additive] alias ⟨_, exponent_dvd_of_forall_pow_eq_one⟩ := exponent_dvd_iff_forall_pow_eq_one @[to_additive] theorem exponent_dvd {n : ℕ} : exponent G ∣ n ↔ ∀ g : G, orderOf g ∣ n := by simp_rw [exponent_dvd_iff_forall_pow_eq_one, orderOf_dvd_iff_pow_eq_one] variable (G) @[to_additive] theorem lcm_orderOf_dvd_exponent [Fintype G] : (Finset.univ : Finset G).lcm orderOf ∣ exponent G := by apply Finset.lcm_dvd intro g _ exact order_dvd_exponent g @[to_additive exists_addOrderOf_eq_pow_padic_val_nat_add_exponent] theorem _root_.Nat.Prime.exists_orderOf_eq_pow_factorization_exponent {p : ℕ} (hp : p.Prime) : ∃ g : G, orderOf g = p ^ (exponent G).factorization p := by haveI := Fact.mk hp rcases eq_or_ne ((exponent G).factorization p) 0 with (h \| h) · refine ⟨1, by rw [h, pow_zero, orderOf_one]⟩ have he : 0 < exponent G := Ne.bot_lt fun ht => by rw [ht] at h apply h rw [bot_eq_zero, Nat.factorization_zero, Finsupp.zero_apply] rw [← Finsupp.mem_support_iff] at h obtain ⟨g, hg⟩ : ∃ g : G, g ^ (exponent G / p) ≠ 1 := by suffices key : ¬exponent G ∣ exponent G / p by rwa [exponent_dvd_iff_forall_pow_eq_one, not_forall] at key exact fun hd => hp.one_lt.not_le ((mul_le_iff_le_one_left he).mp <\| Nat.le_of_dvd he <\| Nat.mul_dvd_of_dvd_div (Nat.dvd_of_mem_primeFactors h) hd) obtain ⟨k, hk : exponent G = p ^ _ * k⟩ := Nat.ordProj_dvd _ _ obtain ⟨t, ht⟩ := Nat.exists_eq_succ_of_ne_zero (Finsupp.mem_support_iff.mp h) refine ⟨g ^ k, ?_⟩ rw [ht] apply orderOf_eq_prime_pow · rwa [hk, mul_comm, ht, pow_succ, ← mul_assoc, Nat.mul_div_cancel _ hp.pos, pow_mul] at hg · rw [← Nat.succ_eq_add_one, ← ht, ← pow_mul, mul_comm, ← hk] exact pow_exponent_eq_one g variable {G} in open Nat in /-- If two commuting elements `x` and `y` of a monoid have order `n` and `m`, there is an element of order `lcm n m`. The result actually gives an explicit (computable) element, written as the product of a power of `x` and a power of `y`. See also the result below if you don't need the explicit formula. -/ @[to_additive "If two commuting elements `x` and `y` of an additive monoid have order `n` and `m`, there is an element of order `lcm n m`. The result actually gives an explicit (computable) element, written as the sum of a multiple of `x` and a multiple of `y`. See also the result below if you don't need the explicit formula."] lemma _root_.Commute.orderOf_mul_pow_eq_lcm {x y : G} (h : Commute x y) (hx : orderOf x ≠ 0) (hy : orderOf y ≠ 0) : orderOf (x ^ (orderOf x / (factorizationLCMLeft (orderOf x) (orderOf y))) * y ^ (orderOf y / factorizationLCMRight (orderOf x) (orderOf y))) = Nat.lcm (orderOf x) (orderOf y) := by rw [(h.pow_pow _ _).orderOf_mul_eq_mul_orderOf_of_coprime] all_goals iterate 2 rw [orderOf_pow_orderOf_div]; try rw [Coprime] all_goals simp [factorizationLCMLeft_mul_factorizationLCMRight, factorizationLCMLeft_dvd_left, factorizationLCMRight_dvd_right, coprime_factorizationLCMLeft_factorizationLCMRight, hx, hy] open Submonoid in /-- If two commuting elements `x` and `y` of a monoid have order `n` and `m`, then there is an element of order `lcm n m` that lies in the subgroup generated by `x` and `y`. -/ @[to_additive "If two commuting elements `x` and `y` of an additive monoid have order `n` and `m`, then there is an element of order `lcm n m` that lies in the additive subgroup generated by `x` and `y`."] theorem _root_.Commute.exists_orderOf_eq_lcm {x y : G} (h : Commute x y) : ∃ z ∈ closure {x, y}, orderOf z = Nat.lcm (orderOf x) (orderOf y) := by by_cases hx : orderOf x = 0 <;> by_cases hy : orderOf y = 0 · exact ⟨x, subset_closure (by simp), by simp [hx]⟩ · exact ⟨x, subset_closure (by simp), by simp [hx]⟩ · exact ⟨y, subset_closure (by simp), by simp [hy]⟩ · exact ⟨_, mul_mem (pow_mem (subset_closure (by simp)) _) (pow_mem (subset_closure (by simp)) _), h.orderOf_mul_pow_eq_lcm hx hy⟩ /-- A nontrivial monoid has prime exponent `p` if and only if every non-identity element has order `p`. -/ @[to_additive] lemma exponent_eq_prime_iff {G : Type*} [Monoid G] [Nontrivial G] {p : ℕ} (hp : p.Prime) : Monoid.exponent G = p ↔ ∀ g : G, g ≠ 1 → orderOf g = p := by refine ⟨fun hG g hg ↦ ?_, fun h ↦ dvd_antisymm ?_ ?_⟩ · rw [Ne, ← orderOf_eq_one_iff] at hg exact Eq.symm <\| (hp.dvd_iff_eq hg).mp <\| hG ▸ Monoid.order_dvd_exponent g · rw [exponent_dvd] intro g by_cases hg : g = 1 · simp [hg] · rw [h g hg] · obtain ⟨g, hg⟩ := exists_ne (1 : G) simpa [h g hg] using Monoid.order_dvd_exponent g variable {G} @[to_additive] theorem exponent_ne_zero_iff_range_orderOf_finite (h : ∀ g : G, 0 < orderOf g) : exponent G ≠ 0 ↔ (Set.range (orderOf : G → ℕ)).Finite := by refine ⟨fun he => ?_, fun he => ?_⟩ · by_contra h obtain ⟨m, ⟨t, rfl⟩, het⟩ := Set.Infinite.exists_gt h (exponent G) exact pow_ne_one_of_lt_orderOf he het (pow_exponent_eq_one t) · lift Set.range (orderOf (G := G)) to Finset ℕ using he with t ht have htpos : 0 < t.prod id := by refine Finset.prod_pos fun a ha => ?_ rw [← Finset.mem_coe, ht] at ha obtain ⟨k, rfl⟩ := ha	exact h k suffices exponent G ∣ t.prod id by intro h rw [h, zero_dvd_iff] at this exact htpos.ne' this rw [exponent_dvd] intro g apply Finset.dvd_prod_of_mem id (?_ : orderOf g ∈ _)	Mathlib/GroupTheory/Exponent.lean	314	321
/- 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.QuasiIso import Mathlib.CategoryTheory.Limits.Preserves.Finite import Mathlib.CategoryTheory.Limits.Preserves.Shapes.Kernels /-! # Functors which preserves homology If `F : C ⥤ D` is a functor between categories with zero morphisms, we shall say that `F` preserves homology when `F` preserves both kernels and cokernels. This typeclass is named `[F.PreservesHomology]`, and is automatically satisfied when `F` preserves both finite limits and finite colimits. If `S : ShortComplex C` and `[F.PreservesHomology]`, then there is an isomorphism `S.mapHomologyIso F : (S.map F).homology ≅ F.obj S.homology`, which is part of the natural isomorphism `homologyFunctorIso F` between the functors `F.mapShortComplex ⋙ homologyFunctor D` and `homologyFunctor C ⋙ F`. -/ namespace CategoryTheory open Category Limits variable {C D : Type*} [Category C] [Category D] [HasZeroMorphisms C] [HasZeroMorphisms D] namespace Functor variable (F : C ⥤ D) /-- A functor preserves homology when it preserves both kernels and cokernels. -/ class PreservesHomology (F : C ⥤ D) [PreservesZeroMorphisms F] : Prop where /-- the functor preserves kernels -/ preservesKernels ⦃X Y : C⦄ (f : X ⟶ Y) : PreservesLimit (parallelPair f 0) F := by infer_instance /-- the functor preserves cokernels -/ preservesCokernels ⦃X Y : C⦄ (f : X ⟶ Y) : PreservesColimit (parallelPair f 0) F := by infer_instance variable [PreservesZeroMorphisms F] /-- A functor which preserves homology preserves kernels. -/ lemma PreservesHomology.preservesKernel [F.PreservesHomology] {X Y : C} (f : X ⟶ Y) : PreservesLimit (parallelPair f 0) F := PreservesHomology.preservesKernels _ /-- A functor which preserves homology preserves cokernels. -/ lemma PreservesHomology.preservesCokernel [F.PreservesHomology] {X Y : C} (f : X ⟶ Y) : PreservesColimit (parallelPair f 0) F := PreservesHomology.preservesCokernels _ noncomputable instance preservesHomologyOfExact [PreservesFiniteLimits F] [PreservesFiniteColimits F] : F.PreservesHomology where end Functor namespace ShortComplex variable {S S₁ S₂ : ShortComplex C} namespace LeftHomologyData variable (h : S.LeftHomologyData) (F : C ⥤ D) /-- A left homology data `h` of a short complex `S` is preserved by a functor `F` is `F` preserves the kernel of `S.g : S.X₂ ⟶ S.X₃` and the cokernel of `h.f' : S.X₁ ⟶ h.K`. -/ class IsPreservedBy [F.PreservesZeroMorphisms] : Prop where /-- the functor preserves the kernel of `S.g : S.X₂ ⟶ S.X₃`. -/ g : PreservesLimit (parallelPair S.g 0) F /-- the functor preserves the cokernel of `h.f' : S.X₁ ⟶ h.K`. -/ f' : PreservesColimit (parallelPair h.f' 0) F variable [F.PreservesZeroMorphisms] noncomputable instance isPreservedBy_of_preservesHomology [F.PreservesHomology] : h.IsPreservedBy F where g := Functor.PreservesHomology.preservesKernel _ _ f' := Functor.PreservesHomology.preservesCokernel _ _ variable [h.IsPreservedBy F] include h in /-- When a left homology data is preserved by a functor `F`, this functor preserves the kernel of `S.g : S.X₂ ⟶ S.X₃`. -/ lemma IsPreservedBy.hg : PreservesLimit (parallelPair S.g 0) F := @IsPreservedBy.g _ _ _ _ _ _ _ h F _ _ /-- When a left homology data `h` is preserved by a functor `F`, this functor preserves the cokernel of `h.f' : S.X₁ ⟶ h.K`. -/ lemma IsPreservedBy.hf' : PreservesColimit (parallelPair h.f' 0) F := IsPreservedBy.f' /-- When a left homology data `h` of a short complex `S` is preserved by a functor `F`, this is the induced left homology data `h.map F` for the short complex `S.map F`. -/ @[simps] noncomputable def map : (S.map F).LeftHomologyData := by have := IsPreservedBy.hg h F have := IsPreservedBy.hf' h F have wi : F.map h.i ≫ F.map S.g = 0 := by rw [← F.map_comp, h.wi, F.map_zero] have hi := KernelFork.mapIsLimit _ h.hi F let f' : F.obj S.X₁ ⟶ F.obj h.K := hi.lift (KernelFork.ofι (S.map F).f (S.map F).zero) have hf' : f' = F.map h.f' := Fork.IsLimit.hom_ext hi (by rw [Fork.IsLimit.lift_ι hi] simp only [KernelFork.map_ι, Fork.ι_ofι, map_f, ← F.map_comp, f'_i]) have wπ : f' ≫ F.map h.π = 0 := by rw [hf', ← F.map_comp, f'_π, F.map_zero] have hπ : IsColimit (CokernelCofork.ofπ (F.map h.π) wπ) := by let e : parallelPair f' 0 ≅ parallelPair (F.map h.f') 0 := parallelPair.ext (Iso.refl _) (Iso.refl _) (by simpa using hf') (by simp) refine IsColimit.precomposeInvEquiv e _ (IsColimit.ofIsoColimit (CokernelCofork.mapIsColimit _ h.hπ' F) ?_) exact Cofork.ext (Iso.refl _) (by simp [e]) exact { K := F.obj h.K H := F.obj h.H i := F.map h.i π := F.map h.π wi := wi hi := hi wπ := wπ hπ := hπ } @[simp] lemma map_f' : (h.map F).f' = F.map h.f' := by rw [← cancel_mono (h.map F).i, f'_i, map_f, map_i, ← F.map_comp, f'_i] end LeftHomologyData /-- Given a left homology map data `ψ : LeftHomologyMapData φ h₁ h₂` such that both left homology data `h₁` and `h₂` are preserved by a functor `F`, this is the induced left homology map data for the morphism `F.mapShortComplex.map φ`. -/ @[simps] def LeftHomologyMapData.map {φ : S₁ ⟶ S₂} {h₁ : S₁.LeftHomologyData} {h₂ : S₂.LeftHomologyData} (ψ : LeftHomologyMapData φ h₁ h₂) (F : C ⥤ D) [F.PreservesZeroMorphisms] [h₁.IsPreservedBy F] [h₂.IsPreservedBy F] : LeftHomologyMapData (F.mapShortComplex.map φ) (h₁.map F) (h₂.map F) where φK := F.map ψ.φK φH := F.map ψ.φH commi := by simpa only [F.map_comp] using F.congr_map ψ.commi commf' := by simpa only [LeftHomologyData.map_f', F.map_comp] using F.congr_map ψ.commf' commπ := by simpa only [F.map_comp] using F.congr_map ψ.commπ namespace RightHomologyData variable (h : S.RightHomologyData) (F : C ⥤ D) /-- A right homology data `h` of a short complex `S` is preserved by a functor `F` is `F` preserves the cokernel of `S.f : S.X₁ ⟶ S.X₂` and the kernel of `h.g' : h.Q ⟶ S.X₃`. -/ class IsPreservedBy [F.PreservesZeroMorphisms] : Prop where /-- the functor preserves the cokernel of `S.f : S.X₁ ⟶ S.X₂`. -/ f : PreservesColimit (parallelPair S.f 0) F /-- the functor preserves the kernel of `h.g' : h.Q ⟶ S.X₃`. -/ g' : PreservesLimit (parallelPair h.g' 0) F variable [F.PreservesZeroMorphisms] noncomputable instance isPreservedBy_of_preservesHomology [F.PreservesHomology] : h.IsPreservedBy F where f := Functor.PreservesHomology.preservesCokernel F _ g' := Functor.PreservesHomology.preservesKernel F _ variable [h.IsPreservedBy F] include h in /-- When a right homology data is preserved by a functor `F`, this functor preserves the cokernel of `S.f : S.X₁ ⟶ S.X₂`. -/ lemma IsPreservedBy.hf : PreservesColimit (parallelPair S.f 0) F := @IsPreservedBy.f _ _ _ _ _ _ _ h F _ _ /-- When a right homology data `h` is preserved by a functor `F`, this functor preserves the kernel of `h.g' : h.Q ⟶ S.X₃`. -/ lemma IsPreservedBy.hg' : PreservesLimit (parallelPair h.g' 0) F := @IsPreservedBy.g' _ _ _ _ _ _ _ h F _ _ /-- When a right homology data `h` of a short complex `S` is preserved by a functor `F`, this is the induced right homology data `h.map F` for the short complex `S.map F`. -/ @[simps] noncomputable def map : (S.map F).RightHomologyData := by have := IsPreservedBy.hf h F have := IsPreservedBy.hg' h F have wp : F.map S.f ≫ F.map h.p = 0 := by rw [← F.map_comp, h.wp, F.map_zero] have hp := CokernelCofork.mapIsColimit _ h.hp F let g' : F.obj h.Q ⟶ F.obj S.X₃ := hp.desc (CokernelCofork.ofπ (S.map F).g (S.map F).zero) have hg' : g' = F.map h.g' := by apply Cofork.IsColimit.hom_ext hp rw [Cofork.IsColimit.π_desc hp] simp only [Cofork.π_ofπ, CokernelCofork.map_π, map_g, ← F.map_comp, p_g'] have wι : F.map h.ι ≫ g' = 0 := by rw [hg', ← F.map_comp, ι_g', F.map_zero] have hι : IsLimit (KernelFork.ofι (F.map h.ι) wι) := by let e : parallelPair g' 0 ≅ parallelPair (F.map h.g') 0 := parallelPair.ext (Iso.refl _) (Iso.refl _) (by simpa using hg') (by simp) refine IsLimit.postcomposeHomEquiv e _ (IsLimit.ofIsoLimit (KernelFork.mapIsLimit _ h.hι' F) ?_) exact Fork.ext (Iso.refl _) (by simp [e]) exact { Q := F.obj h.Q H := F.obj h.H p := F.map h.p ι := F.map h.ι wp := wp hp := hp wι := wι hι := hι } @[simp] lemma map_g' : (h.map F).g' = F.map h.g' := by rw [← cancel_epi (h.map F).p, p_g', map_g, map_p, ← F.map_comp, p_g'] end RightHomologyData /-- Given a right homology map data `ψ : RightHomologyMapData φ h₁ h₂` such that both right homology data `h₁` and `h₂` are preserved by a functor `F`, this is the induced right homology map data for the morphism `F.mapShortComplex.map φ`. -/ @[simps] def RightHomologyMapData.map {φ : S₁ ⟶ S₂} {h₁ : S₁.RightHomologyData} {h₂ : S₂.RightHomologyData} (ψ : RightHomologyMapData φ h₁ h₂) (F : C ⥤ D) [F.PreservesZeroMorphisms] [h₁.IsPreservedBy F] [h₂.IsPreservedBy F] : RightHomologyMapData (F.mapShortComplex.map φ) (h₁.map F) (h₂.map F) where φQ := F.map ψ.φQ φH := F.map ψ.φH commp := by simpa only [F.map_comp] using F.congr_map ψ.commp commg' := by simpa only [RightHomologyData.map_g', F.map_comp] using F.congr_map ψ.commg' commι := by simpa only [F.map_comp] using F.congr_map ψ.commι /-- When a homology data `h` of a short complex `S` is such that both `h.left` and `h.right` are preserved by a functor `F`, this is the induced homology data `h.map F` for the short complex `S.map F`. -/ @[simps] noncomputable def HomologyData.map (h : S.HomologyData) (F : C ⥤ D) [F.PreservesZeroMorphisms] [h.left.IsPreservedBy F] [h.right.IsPreservedBy F] : (S.map F).HomologyData where left := h.left.map F right := h.right.map F iso := F.mapIso h.iso comm := by simpa only [F.map_comp] using F.congr_map h.comm /-- Given a homology map data `ψ : HomologyMapData φ h₁ h₂` such that `h₁.left`, `h₁.right`, `h₂.left` and `h₂.right` are all preserved by a functor `F`, this is the induced homology map data for the morphism `F.mapShortComplex.map φ`. -/ @[simps] def HomologyMapData.map {φ : S₁ ⟶ S₂} {h₁ : S₁.HomologyData} {h₂ : S₂.HomologyData} (ψ : HomologyMapData φ h₁ h₂) (F : C ⥤ D) [F.PreservesZeroMorphisms] [h₁.left.IsPreservedBy F] [h₁.right.IsPreservedBy F] [h₂.left.IsPreservedBy F] [h₂.right.IsPreservedBy F] : HomologyMapData (F.mapShortComplex.map φ) (h₁.map F) (h₂.map F) where left := ψ.left.map F right := ψ.right.map F end ShortComplex namespace Functor variable (F : C ⥤ D) [PreservesZeroMorphisms F] (S : ShortComplex C) {S₁ S₂ : ShortComplex C} /-- A functor preserves the left homology of a short complex `S` if it preserves all the left homology data of `S`. -/ class PreservesLeftHomologyOf : Prop where /-- the functor preserves all the left homology data of the short complex -/ isPreservedBy : ∀ (h : S.LeftHomologyData), h.IsPreservedBy F /-- A functor preserves the right homology of a short complex `S` if it preserves all the right homology data of `S`. -/ class PreservesRightHomologyOf : Prop where /-- the functor preserves all the right homology data of the short complex -/ isPreservedBy : ∀ (h : S.RightHomologyData), h.IsPreservedBy F instance PreservesHomology.preservesLeftHomologyOf [F.PreservesHomology] : F.PreservesLeftHomologyOf S := ⟨inferInstance⟩ instance PreservesHomology.preservesRightHomologyOf [F.PreservesHomology] : F.PreservesRightHomologyOf S := ⟨inferInstance⟩ variable {S} /-- If a functor preserves a certain left homology data of a short complex `S`, then it preserves the left homology of `S`. -/ lemma PreservesLeftHomologyOf.mk' (h : S.LeftHomologyData) [h.IsPreservedBy F] : F.PreservesLeftHomologyOf S where isPreservedBy h' := { g := ShortComplex.LeftHomologyData.IsPreservedBy.hg h F f' := by have := ShortComplex.LeftHomologyData.IsPreservedBy.hf' h F let e : parallelPair h.f' 0 ≅ parallelPair h'.f' 0 := parallelPair.ext (Iso.refl _) (ShortComplex.cyclesMapIso' (Iso.refl S) h h') (by simp) (by simp) exact preservesColimit_of_iso_diagram F e } /-- If a functor preserves a certain right homology data of a short complex `S`, then it preserves the right homology of `S`. -/ lemma PreservesRightHomologyOf.mk' (h : S.RightHomologyData) [h.IsPreservedBy F] : F.PreservesRightHomologyOf S where isPreservedBy h' := { f := ShortComplex.RightHomologyData.IsPreservedBy.hf h F g' := by have := ShortComplex.RightHomologyData.IsPreservedBy.hg' h F let e : parallelPair h.g' 0 ≅ parallelPair h'.g' 0 := parallelPair.ext (ShortComplex.opcyclesMapIso' (Iso.refl S) h h') (Iso.refl _) (by simp) (by simp) exact preservesLimit_of_iso_diagram F e } end Functor namespace ShortComplex variable {S : ShortComplex C} (h₁ : S.LeftHomologyData) (h₂ : S.RightHomologyData) (F : C ⥤ D) [F.PreservesZeroMorphisms] instance LeftHomologyData.isPreservedBy_of_preserves [F.PreservesLeftHomologyOf S] : h₁.IsPreservedBy F := Functor.PreservesLeftHomologyOf.isPreservedBy _ instance RightHomologyData.isPreservedBy_of_preserves [F.PreservesRightHomologyOf S] : h₂.IsPreservedBy F := Functor.PreservesRightHomologyOf.isPreservedBy _ variable (S) instance hasLeftHomology_of_preserves [S.HasLeftHomology] [F.PreservesLeftHomologyOf S] : (S.map F).HasLeftHomology := HasLeftHomology.mk' (S.leftHomologyData.map F) instance hasLeftHomology_of_preserves' [S.HasLeftHomology] [F.PreservesLeftHomologyOf S] : (F.mapShortComplex.obj S).HasLeftHomology := by dsimp; infer_instance instance hasRightHomology_of_preserves [S.HasRightHomology] [F.PreservesRightHomologyOf S] : (S.map F).HasRightHomology := HasRightHomology.mk' (S.rightHomologyData.map F) instance hasRightHomology_of_preserves' [S.HasRightHomology] [F.PreservesRightHomologyOf S] : (F.mapShortComplex.obj S).HasRightHomology := by dsimp; infer_instance instance hasHomology_of_preserves [S.HasHomology] [F.PreservesLeftHomologyOf S] [F.PreservesRightHomologyOf S] : (S.map F).HasHomology := HasHomology.mk' (S.homologyData.map F) instance hasHomology_of_preserves' [S.HasHomology] [F.PreservesLeftHomologyOf S] [F.PreservesRightHomologyOf S] : (F.mapShortComplex.obj S).HasHomology := by dsimp; infer_instance section variable (hl : S.LeftHomologyData) (hr : S.RightHomologyData) {S₁ S₂ : ShortComplex C} (φ : S₁ ⟶ S₂) (hl₁ : S₁.LeftHomologyData) (hr₁ : S₁.RightHomologyData) (hl₂ : S₂.LeftHomologyData) (hr₂ : S₂.RightHomologyData) (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) (F : C ⥤ D) [F.PreservesZeroMorphisms] namespace LeftHomologyData variable [hl₁.IsPreservedBy F] [hl₂.IsPreservedBy F] lemma map_cyclesMap' : F.map (ShortComplex.cyclesMap' φ hl₁ hl₂) = ShortComplex.cyclesMap' (F.mapShortComplex.map φ) (hl₁.map F) (hl₂.map F) := by have γ : ShortComplex.LeftHomologyMapData φ hl₁ hl₂ := default rw [γ.cyclesMap'_eq, (γ.map F).cyclesMap'_eq, ShortComplex.LeftHomologyMapData.map_φK] lemma map_leftHomologyMap' : F.map (ShortComplex.leftHomologyMap' φ hl₁ hl₂) = ShortComplex.leftHomologyMap' (F.mapShortComplex.map φ) (hl₁.map F) (hl₂.map F) := by have γ : ShortComplex.LeftHomologyMapData φ hl₁ hl₂ := default rw [γ.leftHomologyMap'_eq, (γ.map F).leftHomologyMap'_eq, ShortComplex.LeftHomologyMapData.map_φH] end LeftHomologyData namespace RightHomologyData variable [hr₁.IsPreservedBy F] [hr₂.IsPreservedBy F] lemma map_opcyclesMap' : F.map (ShortComplex.opcyclesMap' φ hr₁ hr₂) = ShortComplex.opcyclesMap' (F.mapShortComplex.map φ) (hr₁.map F) (hr₂.map F) := by have γ : ShortComplex.RightHomologyMapData φ hr₁ hr₂ := default rw [γ.opcyclesMap'_eq, (γ.map F).opcyclesMap'_eq, ShortComplex.RightHomologyMapData.map_φQ] lemma map_rightHomologyMap' : F.map (ShortComplex.rightHomologyMap' φ hr₁ hr₂) = ShortComplex.rightHomologyMap' (F.mapShortComplex.map φ) (hr₁.map F) (hr₂.map F) := by have γ : ShortComplex.RightHomologyMapData φ hr₁ hr₂ := default rw [γ.rightHomologyMap'_eq, (γ.map F).rightHomologyMap'_eq, ShortComplex.RightHomologyMapData.map_φH] end RightHomologyData lemma HomologyData.map_homologyMap' [h₁.left.IsPreservedBy F] [h₁.right.IsPreservedBy F] [h₂.left.IsPreservedBy F] [h₂.right.IsPreservedBy F] : F.map (ShortComplex.homologyMap' φ h₁ h₂) = ShortComplex.homologyMap' (F.mapShortComplex.map φ) (h₁.map F) (h₂.map F) := LeftHomologyData.map_leftHomologyMap' _ _ _ _ /-- When a functor `F` preserves the left homology of a short complex `S`, this is the canonical isomorphism `(S.map F).cycles ≅ F.obj S.cycles`. -/ noncomputable def mapCyclesIso [S.HasLeftHomology] [F.PreservesLeftHomologyOf S] : (S.map F).cycles ≅ F.obj S.cycles := (S.leftHomologyData.map F).cyclesIso @[reassoc (attr := simp)] lemma mapCyclesIso_hom_iCycles [S.HasLeftHomology] [F.PreservesLeftHomologyOf S] : (S.mapCyclesIso F).hom ≫ F.map S.iCycles = (S.map F).iCycles := by apply LeftHomologyData.cyclesIso_hom_comp_i /-- When a functor `F` preserves the left homology of a short complex `S`, this is the canonical isomorphism `(S.map F).leftHomology ≅ F.obj S.leftHomology`. -/ noncomputable def mapLeftHomologyIso [S.HasLeftHomology] [F.PreservesLeftHomologyOf S] : (S.map F).leftHomology ≅ F.obj S.leftHomology := (S.leftHomologyData.map F).leftHomologyIso /-- When a functor `F` preserves the right homology of a short complex `S`, this is the canonical isomorphism `(S.map F).opcycles ≅ F.obj S.opcycles`. -/ noncomputable def mapOpcyclesIso [S.HasRightHomology] [F.PreservesRightHomologyOf S] : (S.map F).opcycles ≅ F.obj S.opcycles := (S.rightHomologyData.map F).opcyclesIso /-- When a functor `F` preserves the right homology of a short complex `S`, this is the canonical isomorphism `(S.map F).rightHomology ≅ F.obj S.rightHomology`. -/ noncomputable def mapRightHomologyIso [S.HasRightHomology] [F.PreservesRightHomologyOf S] : (S.map F).rightHomology ≅ F.obj S.rightHomology := (S.rightHomologyData.map F).rightHomologyIso /-- When a functor `F` preserves the left homology of a short complex `S`, this is the canonical isomorphism `(S.map F).homology ≅ F.obj S.homology`. -/ noncomputable def mapHomologyIso [S.HasHomology] [(S.map F).HasHomology] [F.PreservesLeftHomologyOf S] : (S.map F).homology ≅ F.obj S.homology := (S.homologyData.left.map F).homologyIso /-- When a functor `F` preserves the right homology of a short complex `S`, this is the canonical isomorphism `(S.map F).homology ≅ F.obj S.homology`. -/ noncomputable def mapHomologyIso' [S.HasHomology] [(S.map F).HasHomology] [F.PreservesRightHomologyOf S] : (S.map F).homology ≅ F.obj S.homology := (S.homologyData.right.map F).homologyIso ≪≫ F.mapIso S.homologyData.right.homologyIso.symm variable {S} lemma LeftHomologyData.mapCyclesIso_eq [S.HasLeftHomology] [F.PreservesLeftHomologyOf S] : S.mapCyclesIso F = (hl.map F).cyclesIso ≪≫ F.mapIso hl.cyclesIso.symm := by ext dsimp [mapCyclesIso, cyclesIso] simp only [map_cyclesMap', ← cyclesMap'_comp, Functor.map_id, comp_id, Functor.mapShortComplex_obj] lemma LeftHomologyData.mapLeftHomologyIso_eq [S.HasLeftHomology] [F.PreservesLeftHomologyOf S] : S.mapLeftHomologyIso F = (hl.map F).leftHomologyIso ≪≫ F.mapIso hl.leftHomologyIso.symm := by ext dsimp [mapLeftHomologyIso, leftHomologyIso] simp only [map_leftHomologyMap', ← leftHomologyMap'_comp, Functor.map_id, comp_id, Functor.mapShortComplex_obj] lemma RightHomologyData.mapOpcyclesIso_eq [S.HasRightHomology] [F.PreservesRightHomologyOf S] : S.mapOpcyclesIso F = (hr.map F).opcyclesIso ≪≫ F.mapIso hr.opcyclesIso.symm := by ext dsimp [mapOpcyclesIso, opcyclesIso] simp only [map_opcyclesMap', ← opcyclesMap'_comp, Functor.map_id, comp_id, Functor.mapShortComplex_obj] lemma RightHomologyData.mapRightHomologyIso_eq [S.HasRightHomology] [F.PreservesRightHomologyOf S] : S.mapRightHomologyIso F = (hr.map F).rightHomologyIso ≪≫ F.mapIso hr.rightHomologyIso.symm := by ext dsimp [mapRightHomologyIso, rightHomologyIso] simp only [map_rightHomologyMap', ← rightHomologyMap'_comp, Functor.map_id, comp_id, Functor.mapShortComplex_obj] lemma LeftHomologyData.mapHomologyIso_eq [S.HasHomology] [(S.map F).HasHomology] [F.PreservesLeftHomologyOf S] : S.mapHomologyIso F = (hl.map F).homologyIso ≪≫ F.mapIso hl.homologyIso.symm := by ext dsimp only [mapHomologyIso, homologyIso, ShortComplex.leftHomologyIso, leftHomologyMapIso', leftHomologyIso, Functor.mapIso, Iso.symm, Iso.trans, Iso.refl] simp only [F.map_comp, map_leftHomologyMap', ← leftHomologyMap'_comp, comp_id, Functor.map_id, Functor.mapShortComplex_obj] lemma RightHomologyData.mapHomologyIso'_eq [S.HasHomology] [(S.map F).HasHomology] [F.PreservesRightHomologyOf S] : S.mapHomologyIso' F = (hr.map F).homologyIso ≪≫ F.mapIso hr.homologyIso.symm := by ext dsimp only [Iso.trans, Iso.symm, Iso.refl, Functor.mapIso, mapHomologyIso', homologyIso, rightHomologyIso, rightHomologyMapIso', ShortComplex.rightHomologyIso] simp only [assoc, F.map_comp, map_rightHomologyMap', ← rightHomologyMap'_comp_assoc] @[reassoc] lemma mapCyclesIso_hom_naturality [S₁.HasLeftHomology] [S₂.HasLeftHomology] [F.PreservesLeftHomologyOf S₁] [F.PreservesLeftHomologyOf S₂] : cyclesMap (F.mapShortComplex.map φ) ≫ (S₂.mapCyclesIso F).hom = (S₁.mapCyclesIso F).hom ≫ F.map (cyclesMap φ) := by dsimp only [cyclesMap, mapCyclesIso, LeftHomologyData.cyclesIso, cyclesMapIso', Iso.refl] simp only [LeftHomologyData.map_cyclesMap', Functor.mapShortComplex_obj, ← cyclesMap'_comp, comp_id, id_comp] @[reassoc] lemma mapCyclesIso_inv_naturality [S₁.HasLeftHomology] [S₂.HasLeftHomology] [F.PreservesLeftHomologyOf S₁] [F.PreservesLeftHomologyOf S₂] : F.map (cyclesMap φ) ≫ (S₂.mapCyclesIso F).inv = (S₁.mapCyclesIso F).inv ≫ cyclesMap (F.mapShortComplex.map φ) := by rw [← cancel_epi (S₁.mapCyclesIso F).hom, ← mapCyclesIso_hom_naturality_assoc, Iso.hom_inv_id, comp_id, Iso.hom_inv_id_assoc] @[reassoc] lemma mapLeftHomologyIso_hom_naturality [S₁.HasLeftHomology] [S₂.HasLeftHomology] [F.PreservesLeftHomologyOf S₁] [F.PreservesLeftHomologyOf S₂] : leftHomologyMap (F.mapShortComplex.map φ) ≫ (S₂.mapLeftHomologyIso F).hom = (S₁.mapLeftHomologyIso F).hom ≫ F.map (leftHomologyMap φ) := by dsimp only [leftHomologyMap, mapLeftHomologyIso, LeftHomologyData.leftHomologyIso, leftHomologyMapIso', Iso.refl] simp only [LeftHomologyData.map_leftHomologyMap', Functor.mapShortComplex_obj, ← leftHomologyMap'_comp, comp_id, id_comp] @[reassoc] lemma mapLeftHomologyIso_inv_naturality [S₁.HasLeftHomology] [S₂.HasLeftHomology] [F.PreservesLeftHomologyOf S₁] [F.PreservesLeftHomologyOf S₂] : F.map (leftHomologyMap φ) ≫ (S₂.mapLeftHomologyIso F).inv = (S₁.mapLeftHomologyIso F).inv ≫ leftHomologyMap (F.mapShortComplex.map φ) := by rw [← cancel_epi (S₁.mapLeftHomologyIso F).hom, ← mapLeftHomologyIso_hom_naturality_assoc, Iso.hom_inv_id, comp_id, Iso.hom_inv_id_assoc] @[reassoc] lemma mapOpcyclesIso_hom_naturality [S₁.HasRightHomology] [S₂.HasRightHomology] [F.PreservesRightHomologyOf S₁] [F.PreservesRightHomologyOf S₂] : opcyclesMap (F.mapShortComplex.map φ) ≫ (S₂.mapOpcyclesIso F).hom = (S₁.mapOpcyclesIso F).hom ≫ F.map (opcyclesMap φ) := by dsimp only [opcyclesMap, mapOpcyclesIso, RightHomologyData.opcyclesIso, opcyclesMapIso', Iso.refl] simp only [RightHomologyData.map_opcyclesMap', Functor.mapShortComplex_obj, ← opcyclesMap'_comp, comp_id, id_comp] @[reassoc] lemma mapOpcyclesIso_inv_naturality [S₁.HasRightHomology] [S₂.HasRightHomology] [F.PreservesRightHomologyOf S₁] [F.PreservesRightHomologyOf S₂] : F.map (opcyclesMap φ) ≫ (S₂.mapOpcyclesIso F).inv = (S₁.mapOpcyclesIso F).inv ≫ opcyclesMap (F.mapShortComplex.map φ) := by rw [← cancel_epi (S₁.mapOpcyclesIso F).hom, ← mapOpcyclesIso_hom_naturality_assoc, Iso.hom_inv_id, comp_id, Iso.hom_inv_id_assoc] @[reassoc] lemma mapRightHomologyIso_hom_naturality [S₁.HasRightHomology] [S₂.HasRightHomology] [F.PreservesRightHomologyOf S₁] [F.PreservesRightHomologyOf S₂] : rightHomologyMap (F.mapShortComplex.map φ) ≫ (S₂.mapRightHomologyIso F).hom = (S₁.mapRightHomologyIso F).hom ≫ F.map (rightHomologyMap φ) := by dsimp only [rightHomologyMap, mapRightHomologyIso, RightHomologyData.rightHomologyIso, rightHomologyMapIso', Iso.refl] simp only [RightHomologyData.map_rightHomologyMap', Functor.mapShortComplex_obj, ← rightHomologyMap'_comp, comp_id, id_comp] @[reassoc] lemma mapRightHomologyIso_inv_naturality [S₁.HasRightHomology] [S₂.HasRightHomology] [F.PreservesRightHomologyOf S₁] [F.PreservesRightHomologyOf S₂] : F.map (rightHomologyMap φ) ≫ (S₂.mapRightHomologyIso F).inv = (S₁.mapRightHomologyIso F).inv ≫ rightHomologyMap (F.mapShortComplex.map φ) := by rw [← cancel_epi (S₁.mapRightHomologyIso F).hom, ← mapRightHomologyIso_hom_naturality_assoc, Iso.hom_inv_id, comp_id, Iso.hom_inv_id_assoc] @[reassoc] lemma mapHomologyIso_hom_naturality [S₁.HasHomology] [S₂.HasHomology] [(S₁.map F).HasHomology] [(S₂.map F).HasHomology] [F.PreservesLeftHomologyOf S₁] [F.PreservesLeftHomologyOf S₂] : @homologyMap _ _ _ (S₁.map F) (S₂.map F) (F.mapShortComplex.map φ) _ _ ≫ (S₂.mapHomologyIso F).hom = (S₁.mapHomologyIso F).hom ≫ F.map (homologyMap φ) := by dsimp only [homologyMap, homologyMap', mapHomologyIso, LeftHomologyData.homologyIso, LeftHomologyData.leftHomologyIso, leftHomologyMapIso', leftHomologyIso, Iso.symm, Iso.trans, Iso.refl] simp only [LeftHomologyData.map_leftHomologyMap', ← leftHomologyMap'_comp, comp_id, id_comp] @[reassoc] lemma mapHomologyIso_inv_naturality [S₁.HasHomology] [S₂.HasHomology] [(S₁.map F).HasHomology] [(S₂.map F).HasHomology] [F.PreservesLeftHomologyOf S₁] [F.PreservesLeftHomologyOf S₂] : F.map (homologyMap φ) ≫ (S₂.mapHomologyIso F).inv = (S₁.mapHomologyIso F).inv ≫ @homologyMap _ _ _ (S₁.map F) (S₂.map F) (F.mapShortComplex.map φ) _ _ := by rw [← cancel_epi (S₁.mapHomologyIso F).hom, ← mapHomologyIso_hom_naturality_assoc,	Iso.hom_inv_id, comp_id, Iso.hom_inv_id_assoc] @[reassoc] lemma mapHomologyIso'_hom_naturality [S₁.HasHomology] [S₂.HasHomology] [(S₁.map F).HasHomology] [(S₂.map F).HasHomology] [F.PreservesRightHomologyOf S₁] [F.PreservesRightHomologyOf S₂] : @homologyMap _ _ _ (S₁.map F) (S₂.map F) (F.mapShortComplex.map φ) _ _ ≫ (S₂.mapHomologyIso' F).hom = (S₁.mapHomologyIso' F).hom ≫ F.map (homologyMap φ) := by dsimp only [Iso.trans, Iso.symm, Functor.mapIso, mapHomologyIso'] simp only [← RightHomologyData.rightHomologyIso_hom_naturality_assoc _ ((homologyData S₁).right.map F) ((homologyData S₂).right.map F), assoc, ← RightHomologyData.map_rightHomologyMap', ← F.map_comp,	Mathlib/Algebra/Homology/ShortComplex/PreservesHomology.lean	585	596
/- Copyright (c) 2022 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kim Morrison, Oleksandr Manzyuk -/ import Mathlib.CategoryTheory.Bicategory.Basic import Mathlib.CategoryTheory.Monoidal.Mon_ import Mathlib.CategoryTheory.Limits.Preserves.Shapes.Equalizers /-! # The category of bimodule objects over a pair of monoid objects. -/ universe v₁ v₂ u₁ u₂ open CategoryTheory open CategoryTheory.MonoidalCategory variable {C : Type u₁} [Category.{v₁} C] [MonoidalCategory.{v₁} C] section open CategoryTheory.Limits variable [HasCoequalizers C] section variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)] theorem id_tensor_π_preserves_coequalizer_inv_desc {W X Y Z : C} (f g : X ⟶ Y) (h : Z ⊗ Y ⟶ W) (wh : (Z ◁ f) ≫ h = (Z ◁ g) ≫ h) : (Z ◁ coequalizer.π f g) ≫ (PreservesCoequalizer.iso (tensorLeft Z) f g).inv ≫ coequalizer.desc h wh = h := map_π_preserves_coequalizer_inv_desc (tensorLeft Z) f g h wh theorem id_tensor_π_preserves_coequalizer_inv_colimMap_desc {X Y Z X' Y' Z' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : Z ⊗ X ⟶ X') (q : Z ⊗ Y ⟶ Y') (wf : (Z ◁ f) ≫ q = p ≫ f') (wg : (Z ◁ g) ≫ q = p ≫ g') (h : Y' ⟶ Z') (wh : f' ≫ h = g' ≫ h) : (Z ◁ coequalizer.π f g) ≫ (PreservesCoequalizer.iso (tensorLeft Z) f g).inv ≫ colimMap (parallelPairHom (Z ◁ f) (Z ◁ g) f' g' p q wf wg) ≫ coequalizer.desc h wh = q ≫ h := map_π_preserves_coequalizer_inv_colimMap_desc (tensorLeft Z) f g f' g' p q wf wg h wh end section variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)] theorem π_tensor_id_preserves_coequalizer_inv_desc {W X Y Z : C} (f g : X ⟶ Y) (h : Y ⊗ Z ⟶ W) (wh : (f ▷ Z) ≫ h = (g ▷ Z) ≫ h) : (coequalizer.π f g ▷ Z) ≫ (PreservesCoequalizer.iso (tensorRight Z) f g).inv ≫ coequalizer.desc h wh = h := map_π_preserves_coequalizer_inv_desc (tensorRight Z) f g h wh theorem π_tensor_id_preserves_coequalizer_inv_colimMap_desc {X Y Z X' Y' Z' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : X ⊗ Z ⟶ X') (q : Y ⊗ Z ⟶ Y') (wf : (f ▷ Z) ≫ q = p ≫ f') (wg : (g ▷ Z) ≫ q = p ≫ g') (h : Y' ⟶ Z') (wh : f' ≫ h = g' ≫ h) : (coequalizer.π f g ▷ Z) ≫ (PreservesCoequalizer.iso (tensorRight Z) f g).inv ≫ colimMap (parallelPairHom (f ▷ Z) (g ▷ Z) f' g' p q wf wg) ≫ coequalizer.desc h wh = q ≫ h := map_π_preserves_coequalizer_inv_colimMap_desc (tensorRight Z) f g f' g' p q wf wg h wh end end /-- A bimodule object for a pair of monoid objects, all internal to some monoidal category. -/ structure Bimod (A B : Mon_ C) where /-- The underlying monoidal category -/ X : C /-- The left action of this bimodule object -/ actLeft : A.X ⊗ X ⟶ X one_actLeft : (A.one ▷ X) ≫ actLeft = (λ_ X).hom := by aesop_cat left_assoc : (A.mul ▷ X) ≫ actLeft = (α_ A.X A.X X).hom ≫ (A.X ◁ actLeft) ≫ actLeft := by aesop_cat /-- The right action of this bimodule object -/ actRight : X ⊗ B.X ⟶ X actRight_one : (X ◁ B.one) ≫ actRight = (ρ_ X).hom := by aesop_cat right_assoc : (X ◁ B.mul) ≫ actRight = (α_ X B.X B.X).inv ≫ (actRight ▷ B.X) ≫ actRight := by aesop_cat middle_assoc : (actLeft ▷ B.X) ≫ actRight = (α_ A.X X B.X).hom ≫ (A.X ◁ actRight) ≫ actLeft := by aesop_cat attribute [reassoc (attr := simp)] Bimod.one_actLeft Bimod.actRight_one Bimod.left_assoc Bimod.right_assoc Bimod.middle_assoc namespace Bimod variable {A B : Mon_ C} (M : Bimod A B) /-- A morphism of bimodule objects. -/ @[ext] structure Hom (M N : Bimod A B) where /-- The morphism between `M`'s monoidal category and `N`'s monoidal category -/ hom : M.X ⟶ N.X left_act_hom : M.actLeft ≫ hom = (A.X ◁ hom) ≫ N.actLeft := by aesop_cat right_act_hom : M.actRight ≫ hom = (hom ▷ B.X) ≫ N.actRight := by aesop_cat attribute [reassoc (attr := simp)] Hom.left_act_hom Hom.right_act_hom /-- The identity morphism on a bimodule object. -/ @[simps] def id' (M : Bimod A B) : Hom M M where hom := 𝟙 M.X instance homInhabited (M : Bimod A B) : Inhabited (Hom M M) := ⟨id' M⟩ /-- Composition of bimodule object morphisms. -/ @[simps] def comp {M N O : Bimod A B} (f : Hom M N) (g : Hom N O) : Hom M O where hom := f.hom ≫ g.hom instance : Category (Bimod A B) where Hom M N := Hom M N id := id' comp f g := comp f g @[ext] lemma hom_ext {M N : Bimod A B} (f g : M ⟶ N) (h : f.hom = g.hom) : f = g := Hom.ext h @[simp] theorem id_hom' (M : Bimod A B) : (𝟙 M : Hom M M).hom = 𝟙 M.X := rfl @[simp] theorem comp_hom' {M N K : Bimod A B} (f : M ⟶ N) (g : N ⟶ K) : (f ≫ g : Hom M K).hom = f.hom ≫ g.hom := rfl /-- Construct an isomorphism of bimodules by giving an isomorphism between the underlying objects and checking compatibility with left and right actions only in the forward direction. -/ @[simps] def isoOfIso {X Y : Mon_ C} {P Q : Bimod X Y} (f : P.X ≅ Q.X) (f_left_act_hom : P.actLeft ≫ f.hom = (X.X ◁ f.hom) ≫ Q.actLeft) (f_right_act_hom : P.actRight ≫ f.hom = (f.hom ▷ Y.X) ≫ Q.actRight) : P ≅ Q where hom := { hom := f.hom } inv := { hom := f.inv left_act_hom := by rw [← cancel_mono f.hom, Category.assoc, Category.assoc, Iso.inv_hom_id, Category.comp_id, f_left_act_hom, ← Category.assoc, ← MonoidalCategory.whiskerLeft_comp, Iso.inv_hom_id, MonoidalCategory.whiskerLeft_id, Category.id_comp] right_act_hom := by rw [← cancel_mono f.hom, Category.assoc, Category.assoc, Iso.inv_hom_id, Category.comp_id, f_right_act_hom, ← Category.assoc, ← comp_whiskerRight, Iso.inv_hom_id, MonoidalCategory.id_whiskerRight, Category.id_comp] } hom_inv_id := by ext; dsimp; rw [Iso.hom_inv_id] inv_hom_id := by ext; dsimp; rw [Iso.inv_hom_id] variable (A) /-- A monoid object as a bimodule over itself. -/ @[simps] def regular : Bimod A A where X := A.X actLeft := A.mul actRight := A.mul instance : Inhabited (Bimod A A) := ⟨regular A⟩ /-- The forgetful functor from bimodule objects to the ambient category. -/ def forget : Bimod A B ⥤ C where obj A := A.X map f := f.hom open CategoryTheory.Limits variable [HasCoequalizers C] namespace TensorBimod variable {R S T : Mon_ C} (P : Bimod R S) (Q : Bimod S T) /-- The underlying object of the tensor product of two bimodules. -/ noncomputable def X : C := coequalizer (P.actRight ▷ Q.X) ((α_ _ _ _).hom ≫ (P.X ◁ Q.actLeft)) section variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)] /-- Left action for the tensor product of two bimodules. -/ noncomputable def actLeft : R.X ⊗ X P Q ⟶ X P Q := (PreservesCoequalizer.iso (tensorLeft R.X) _ _).inv ≫ colimMap (parallelPairHom _ _ _ _ ((α_ _ _ _).inv ≫ ((α_ _ _ _).inv ▷ _) ≫ (P.actLeft ▷ S.X ▷ Q.X)) ((α_ _ _ _).inv ≫ (P.actLeft ▷ Q.X)) (by dsimp simp only [Category.assoc] slice_lhs 1 2 => rw [associator_inv_naturality_middle] slice_rhs 3 4 => rw [← comp_whiskerRight, middle_assoc, comp_whiskerRight] monoidal) (by dsimp slice_lhs 1 1 => rw [MonoidalCategory.whiskerLeft_comp] slice_lhs 2 3 => rw [associator_inv_naturality_right] slice_lhs 3 4 => rw [whisker_exchange] monoidal)) theorem whiskerLeft_π_actLeft : (R.X ◁ coequalizer.π _ _) ≫ actLeft P Q = (α_ _ _ _).inv ≫ (P.actLeft ▷ Q.X) ≫ coequalizer.π _ _ := by erw [map_π_preserves_coequalizer_inv_colimMap (tensorLeft _)] simp only [Category.assoc] theorem one_act_left' : (R.one ▷ _) ≫ actLeft P Q = (λ_ _).hom := by refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_ dsimp [X] -- Porting note: had to replace `rw` by `erw` slice_lhs 1 2 => erw [whisker_exchange] slice_lhs 2 3 => rw [whiskerLeft_π_actLeft] slice_lhs 1 2 => rw [associator_inv_naturality_left] slice_lhs 2 3 => rw [← comp_whiskerRight, one_actLeft] slice_rhs 1 2 => rw [leftUnitor_naturality] monoidal theorem left_assoc' : (R.mul ▷ _) ≫ actLeft P Q = (α_ R.X R.X _).hom ≫ (R.X ◁ actLeft P Q) ≫ actLeft P Q := by refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_ dsimp [X] slice_lhs 1 2 => rw [whisker_exchange] slice_lhs 2 3 => rw [whiskerLeft_π_actLeft] slice_lhs 1 2 => rw [associator_inv_naturality_left] slice_lhs 2 3 => rw [← comp_whiskerRight, left_assoc, comp_whiskerRight, comp_whiskerRight] slice_rhs 1 2 => rw [associator_naturality_right] slice_rhs 2 3 => rw [← MonoidalCategory.whiskerLeft_comp, whiskerLeft_π_actLeft, MonoidalCategory.whiskerLeft_comp, MonoidalCategory.whiskerLeft_comp] slice_rhs 4 5 => rw [whiskerLeft_π_actLeft] slice_rhs 3 4 => rw [associator_inv_naturality_middle] monoidal end	section variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)] /-- Right action for the tensor product of two bimodules. -/ noncomputable def actRight : X P Q ⊗ T.X ⟶ X P Q := (PreservesCoequalizer.iso (tensorRight T.X) _ _).inv ≫ colimMap (parallelPairHom _ _ _ _ ((α_ _ _ _).hom ≫ (α_ _ _ _).hom ≫ (P.X ◁ S.X ◁ Q.actRight) ≫ (α_ _ _ _).inv)	Mathlib/CategoryTheory/Monoidal/Bimod.lean	250	259
/- Copyright (c) 2022 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kim Morrison -/ import Mathlib.CategoryTheory.Limits.Shapes.ZeroMorphisms import Mathlib.CategoryTheory.Limits.Constructions.BinaryProducts /-! # Limits involving zero objects Binary products and coproducts with a zero object always exist, and pullbacks/pushouts over a zero object are products/coproducts. -/ noncomputable section open CategoryTheory variable {C : Type*} [Category C] namespace CategoryTheory.Limits variable [HasZeroObject C] [HasZeroMorphisms C] open ZeroObject /-- The limit cone for the product with a zero object. -/ def binaryFanZeroLeft (X : C) : BinaryFan (0 : C) X := BinaryFan.mk 0 (𝟙 X) /-- The limit cone for the product with a zero object is limiting. -/ def binaryFanZeroLeftIsLimit (X : C) : IsLimit (binaryFanZeroLeft X) := BinaryFan.isLimitMk (fun s => BinaryFan.snd s) (by aesop_cat) (by simp) (fun s m _ h₂ => by simpa using h₂) instance hasBinaryProduct_zero_left (X : C) : HasBinaryProduct (0 : C) X := HasLimit.mk ⟨_, binaryFanZeroLeftIsLimit X⟩ /-- A zero object is a left unit for categorical product. -/ def zeroProdIso (X : C) : (0 : C) ⨯ X ≅ X := limit.isoLimitCone ⟨_, binaryFanZeroLeftIsLimit X⟩ @[simp] theorem zeroProdIso_hom (X : C) : (zeroProdIso X).hom = prod.snd := rfl @[simp] theorem zeroProdIso_inv_snd (X : C) : (zeroProdIso X).inv ≫ prod.snd = 𝟙 X := by dsimp [zeroProdIso, binaryFanZeroLeft] simp /-- The limit cone for the product with a zero object. -/ def binaryFanZeroRight (X : C) : BinaryFan X (0 : C) := BinaryFan.mk (𝟙 X) 0 /-- The limit cone for the product with a zero object is limiting. -/ def binaryFanZeroRightIsLimit (X : C) : IsLimit (binaryFanZeroRight X) := BinaryFan.isLimitMk (fun s => BinaryFan.fst s) (by simp) (by aesop_cat) (fun s m h₁ _ => by simpa using h₁) instance hasBinaryProduct_zero_right (X : C) : HasBinaryProduct X (0 : C) := HasLimit.mk ⟨_, binaryFanZeroRightIsLimit X⟩ /-- A zero object is a right unit for categorical product. -/ def prodZeroIso (X : C) : X ⨯ (0 : C) ≅ X := limit.isoLimitCone ⟨_, binaryFanZeroRightIsLimit X⟩ @[simp] theorem prodZeroIso_hom (X : C) : (prodZeroIso X).hom = prod.fst := rfl @[simp] theorem prodZeroIso_iso_inv_snd (X : C) : (prodZeroIso X).inv ≫ prod.fst = 𝟙 X := by dsimp [prodZeroIso, binaryFanZeroRight] simp /-- The colimit cocone for the coproduct with a zero object. -/ def binaryCofanZeroLeft (X : C) : BinaryCofan (0 : C) X := BinaryCofan.mk 0 (𝟙 X) /-- The colimit cocone for the coproduct with a zero object is colimiting. -/ def binaryCofanZeroLeftIsColimit (X : C) : IsColimit (binaryCofanZeroLeft X) := BinaryCofan.isColimitMk (fun s => BinaryCofan.inr s) (by aesop_cat) (by simp) (fun s m _ h₂ => by simpa using h₂) instance hasBinaryCoproduct_zero_left (X : C) : HasBinaryCoproduct (0 : C) X := HasColimit.mk ⟨_, binaryCofanZeroLeftIsColimit X⟩ /-- A zero object is a left unit for categorical coproduct. -/ def zeroCoprodIso (X : C) : (0 : C) ⨿ X ≅ X := colimit.isoColimitCocone ⟨_, binaryCofanZeroLeftIsColimit X⟩ @[simp] theorem inr_zeroCoprodIso_hom (X : C) : coprod.inr ≫ (zeroCoprodIso X).hom = 𝟙 X := by dsimp [zeroCoprodIso, binaryCofanZeroLeft] simp @[simp] theorem zeroCoprodIso_inv (X : C) : (zeroCoprodIso X).inv = coprod.inr := rfl /-- The colimit cocone for the coproduct with a zero object. -/ def binaryCofanZeroRight (X : C) : BinaryCofan X (0 : C) := BinaryCofan.mk (𝟙 X) 0 /-- The colimit cocone for the coproduct with a zero object is colimiting. -/ def binaryCofanZeroRightIsColimit (X : C) : IsColimit (binaryCofanZeroRight X) := BinaryCofan.isColimitMk (fun s => BinaryCofan.inl s) (by simp) (by aesop_cat) (fun s m h₁ _ => by simpa using h₁) instance hasBinaryCoproduct_zero_right (X : C) : HasBinaryCoproduct X (0 : C) := HasColimit.mk ⟨_, binaryCofanZeroRightIsColimit X⟩ /-- A zero object is a right unit for categorical coproduct. -/ def coprodZeroIso (X : C) : X ⨿ (0 : C) ≅ X := colimit.isoColimitCocone ⟨_, binaryCofanZeroRightIsColimit X⟩ @[simp] theorem inr_coprodZeroIso_hom (X : C) : coprod.inl ≫ (coprodZeroIso X).hom = 𝟙 X := by dsimp [coprodZeroIso, binaryCofanZeroRight] simp @[simp] theorem coprodZeroIso_inv (X : C) : (coprodZeroIso X).inv = coprod.inl := rfl instance hasPullback_over_zero (X Y : C) [HasBinaryProduct X Y] : HasPullback (0 : X ⟶ 0) (0 : Y ⟶ 0) := HasLimit.mk ⟨_, isPullbackOfIsTerminalIsProduct _ _ _ _ HasZeroObject.zeroIsTerminal (prodIsProd X Y)⟩ /-- The pullback over the zero object is the product. -/ def pullbackZeroZeroIso (X Y : C) [HasBinaryProduct X Y] : pullback (0 : X ⟶ 0) (0 : Y ⟶ 0) ≅ X ⨯ Y := limit.isoLimitCone ⟨_, isPullbackOfIsTerminalIsProduct _ _ _ _ HasZeroObject.zeroIsTerminal (prodIsProd X Y)⟩ @[simp] theorem pullbackZeroZeroIso_inv_fst (X Y : C) [HasBinaryProduct X Y] : (pullbackZeroZeroIso X Y).inv ≫ pullback.fst 0 0 = prod.fst := by dsimp [pullbackZeroZeroIso] simp @[simp] theorem pullbackZeroZeroIso_inv_snd (X Y : C) [HasBinaryProduct X Y] : (pullbackZeroZeroIso X Y).inv ≫ pullback.snd 0 0 = prod.snd := by dsimp [pullbackZeroZeroIso] simp @[simp] theorem pullbackZeroZeroIso_hom_fst (X Y : C) [HasBinaryProduct X Y] : (pullbackZeroZeroIso X Y).hom ≫ prod.fst = pullback.fst 0 0 := by simp [← Iso.eq_inv_comp] @[simp] theorem pullbackZeroZeroIso_hom_snd (X Y : C) [HasBinaryProduct X Y] : (pullbackZeroZeroIso X Y).hom ≫ prod.snd = pullback.snd 0 0 := by simp [← Iso.eq_inv_comp] instance hasPushout_over_zero (X Y : C) [HasBinaryCoproduct X Y] : HasPushout (0 : 0 ⟶ X) (0 : 0 ⟶ Y) := HasColimit.mk ⟨_, isPushoutOfIsInitialIsCoproduct _ _ _ _ HasZeroObject.zeroIsInitial (coprodIsCoprod X Y)⟩ /-- The pushout over the zero object is the coproduct. -/ def pushoutZeroZeroIso (X Y : C) [HasBinaryCoproduct X Y] : pushout (0 : 0 ⟶ X) (0 : 0 ⟶ Y) ≅ X ⨿ Y := colimit.isoColimitCocone ⟨_, isPushoutOfIsInitialIsCoproduct _ _ _ _ HasZeroObject.zeroIsInitial (coprodIsCoprod X Y)⟩ @[simp] theorem inl_pushoutZeroZeroIso_hom (X Y : C) [HasBinaryCoproduct X Y] : pushout.inl _ _ ≫ (pushoutZeroZeroIso X Y).hom = coprod.inl := by dsimp [pushoutZeroZeroIso] simp @[simp] theorem inr_pushoutZeroZeroIso_hom (X Y : C) [HasBinaryCoproduct X Y] : pushout.inr _ _ ≫ (pushoutZeroZeroIso X Y).hom = coprod.inr := by dsimp [pushoutZeroZeroIso] simp @[simp] theorem inl_pushoutZeroZeroIso_inv (X Y : C) [HasBinaryCoproduct X Y] : coprod.inl ≫ (pushoutZeroZeroIso X Y).inv = pushout.inl _ _ := by simp [Iso.comp_inv_eq] @[simp] theorem inr_pushoutZeroZeroIso_inv (X Y : C) [HasBinaryCoproduct X Y] : coprod.inr ≫ (pushoutZeroZeroIso X Y).inv = pushout.inr _ _ := by simp [Iso.comp_inv_eq] end CategoryTheory.Limits		Mathlib/CategoryTheory/Limits/Constructions/ZeroObjects.lean	214	217
/- Copyright (c) 2019 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jan-David Salchow, Sébastien Gouëzel, Jean Lo, Yury Kudryashov, Frédéric Dupuis, Heather Macbeth -/ import Mathlib.Algebra.Module.Opposite import Mathlib.Topology.Algebra.Group.Quotient import Mathlib.Topology.Algebra.Ring.Basic import Mathlib.Topology.UniformSpace.UniformEmbedding import Mathlib.LinearAlgebra.Finsupp.LinearCombination import Mathlib.LinearAlgebra.Pi import Mathlib.LinearAlgebra.Quotient.Defs /-! # Theory of topological modules We use the class `ContinuousSMul` for topological (semi) modules and topological vector spaces. -/ assert_not_exists Star.star open LinearMap (ker range) open Topology Filter Pointwise universe u v w u' section variable {R : Type} {M : Type} [Ring R] [TopologicalSpace R] [TopologicalSpace M] [AddCommGroup M] [Module R M] theorem ContinuousSMul.of_nhds_zero [IsTopologicalRing R] [IsTopologicalAddGroup M] (hmul : Tendsto (fun p : R × M => p.1 • p.2) (𝓝 0 ×ˢ 𝓝 0) (𝓝 0)) (hmulleft : ∀ m : M, Tendsto (fun a : R => a • m) (𝓝 0) (𝓝 0)) (hmulright : ∀ a : R, Tendsto (fun m : M => a • m) (𝓝 0) (𝓝 0)) : ContinuousSMul R M where continuous_smul := by rw [← nhds_prod_eq] at hmul refine continuous_of_continuousAt_zero₂ (AddMonoidHom.smul : R →+ M →+ M) ?_ ?_ ?_ <;> simpa [ContinuousAt] variable (R M) in omit [TopologicalSpace R] in /-- A topological module over a ring has continuous negation. This cannot be an instance, because it would cause search for `[Module ?R M]` with unknown `R`. -/ theorem ContinuousNeg.of_continuousConstSMul [ContinuousConstSMul R M] : ContinuousNeg M where continuous_neg := by simpa using continuous_const_smul (T := M) (-1 : R) end section variable {R : Type} {M : Type} [Ring R] [TopologicalSpace R] [TopologicalSpace M] [AddCommGroup M] [ContinuousAdd M] [Module R M] [ContinuousSMul R M] /-- If `M` is a topological module over `R` and `0` is a limit of invertible elements of `R`, then `⊤` is the only submodule of `M` with a nonempty interior. This is the case, e.g., if `R` is a nontrivially normed field. -/ theorem Submodule.eq_top_of_nonempty_interior' [NeBot (𝓝[{ x : R \| IsUnit x }] 0)] (s : Submodule R M) (hs : (interior (s : Set M)).Nonempty) : s = ⊤ := by rcases hs with ⟨y, hy⟩ refine Submodule.eq_top_iff'.2 fun x => ?_ rw [mem_interior_iff_mem_nhds] at hy have : Tendsto (fun c : R => y + c • x) (𝓝[{ x : R \| IsUnit x }] 0) (𝓝 (y + (0 : R) • x)) := tendsto_const_nhds.add ((tendsto_nhdsWithin_of_tendsto_nhds tendsto_id).smul tendsto_const_nhds) rw [zero_smul, add_zero] at this obtain ⟨_, hu : y + _ • _ ∈ s, u, rfl⟩ := nonempty_of_mem (inter_mem (Filter.mem_map.1 (this hy)) self_mem_nhdsWithin) have hy' : y ∈ ↑s := mem_of_mem_nhds hy rwa [s.add_mem_iff_right hy', ← Units.smul_def, s.smul_mem_iff' u] at hu variable (R M) /-- Let `R` be a topological ring such that zero is not an isolated point (e.g., a nontrivially normed field, see `NormedField.punctured_nhds_neBot`). Let `M` be a nontrivial module over `R` such that `c • x = 0` implies `c = 0 ∨ x = 0`. Then `M` has no isolated points. We formulate this using `NeBot (𝓝[≠] x)`. This lemma is not an instance because Lean would need to find `[ContinuousSMul ?m_1 M]` with unknown `?m_1`. We register this as an instance for `R = ℝ` in `Real.punctured_nhds_module_neBot`. One can also use `haveI := Module.punctured_nhds_neBot R M` in a proof. -/ theorem Module.punctured_nhds_neBot [Nontrivial M] [NeBot (𝓝[≠] (0 : R))] [NoZeroSMulDivisors R M] (x : M) : NeBot (𝓝[≠] x) := by rcases exists_ne (0 : M) with ⟨y, hy⟩ suffices Tendsto (fun c : R => x + c • y) (𝓝[≠] 0) (𝓝[≠] x) from this.neBot refine Tendsto.inf ?_ (tendsto_principal_principal.2 <\| ?_) · convert tendsto_const_nhds.add ((@tendsto_id R _).smul_const y) rw [zero_smul, add_zero] · intro c hc simpa [hy] using hc end section LatticeOps variable {R M₁ M₂ : Type} [SMul R M₁] [SMul R M₂] [u : TopologicalSpace R] {t : TopologicalSpace M₂} [ContinuousSMul R M₂] {F : Type} [FunLike F M₁ M₂] [MulActionHomClass F R M₁ M₂] (f : F) theorem continuousSMul_induced : @ContinuousSMul R M₁ _ u (t.induced f) := let _ : TopologicalSpace M₁ := t.induced f IsInducing.continuousSMul ⟨rfl⟩ continuous_id (map_smul f _ _) end LatticeOps /-- The span of a separable subset with respect to a separable scalar ring is again separable. -/ lemma TopologicalSpace.IsSeparable.span {R M : Type} [AddCommMonoid M] [Semiring R] [Module R M] [TopologicalSpace M] [TopologicalSpace R] [SeparableSpace R] [ContinuousAdd M] [ContinuousSMul R M] {s : Set M} (hs : IsSeparable s) : IsSeparable (Submodule.span R s : Set M) := by rw [Submodule.span_eq_iUnion_nat] refine .iUnion fun n ↦ .image ?_ ?_ · have : IsSeparable {f : Fin n → R × M \| ∀ (i : Fin n), f i ∈ Set.univ ×ˢ s} := by apply isSeparable_pi (fun i ↦ .prod (.of_separableSpace Set.univ) hs) rwa [Set.univ_prod] at this · apply continuous_finset_sum _ (fun i _ ↦ ?_) exact (continuous_fst.comp (continuous_apply i)).smul (continuous_snd.comp (continuous_apply i)) namespace Submodule instance topologicalAddGroup {R M : Type} [Ring R] [AddCommGroup M] [Module R M] [TopologicalSpace M] [IsTopologicalAddGroup M] (S : Submodule R M) : IsTopologicalAddGroup S := inferInstanceAs (IsTopologicalAddGroup S.toAddSubgroup) end Submodule section closure variable {R : Type u} {M : Type v} [Semiring R] [TopologicalSpace M] [AddCommMonoid M] [Module R M] [ContinuousConstSMul R M] theorem Submodule.mapsTo_smul_closure (s : Submodule R M) (c : R) : Set.MapsTo (c • ·) (closure s : Set M) (closure s) := have : Set.MapsTo (c • ·) (s : Set M) s := fun _ h ↦ s.smul_mem c h this.closure (continuous_const_smul c) theorem Submodule.smul_closure_subset (s : Submodule R M) (c : R) : c • closure (s : Set M) ⊆ closure (s : Set M) := (s.mapsTo_smul_closure c).image_subset variable [ContinuousAdd M] /-- The (topological-space) closure of a submodule of a topological `R`-module `M` is itself a submodule. -/ def Submodule.topologicalClosure (s : Submodule R M) : Submodule R M := { s.toAddSubmonoid.topologicalClosure with smul_mem' := s.mapsTo_smul_closure } @[simp, norm_cast] theorem Submodule.topologicalClosure_coe (s : Submodule R M) : (s.topologicalClosure : Set M) = closure (s : Set M) := rfl theorem Submodule.le_topologicalClosure (s : Submodule R M) : s ≤ s.topologicalClosure := subset_closure theorem Submodule.closure_subset_topologicalClosure_span (s : Set M) : closure s ⊆ (span R s).topologicalClosure := by rw [Submodule.topologicalClosure_coe] exact closure_mono subset_span theorem Submodule.isClosed_topologicalClosure (s : Submodule R M) : IsClosed (s.topologicalClosure : Set M) := isClosed_closure theorem Submodule.topologicalClosure_minimal (s : Submodule R M) {t : Submodule R M} (h : s ≤ t) (ht : IsClosed (t : Set M)) : s.topologicalClosure ≤ t := closure_minimal h ht theorem Submodule.topologicalClosure_mono {s : Submodule R M} {t : Submodule R M} (h : s ≤ t) : s.topologicalClosure ≤ t.topologicalClosure := closure_mono h /-- The topological closure of a closed submodule `s` is equal to `s`. -/ theorem IsClosed.submodule_topologicalClosure_eq {s : Submodule R M} (hs : IsClosed (s : Set M)) : s.topologicalClosure = s := SetLike.ext' hs.closure_eq /-- A subspace is dense iff its topological closure is the entire space. -/ theorem Submodule.dense_iff_topologicalClosure_eq_top {s : Submodule R M} : Dense (s : Set M) ↔ s.topologicalClosure = ⊤ := by rw [← SetLike.coe_set_eq, dense_iff_closure_eq] simp instance Submodule.topologicalClosure.completeSpace {M' : Type} [AddCommMonoid M'] [Module R M'] [UniformSpace M'] [ContinuousAdd M'] [ContinuousConstSMul R M'] [CompleteSpace M'] (U : Submodule R M') : CompleteSpace U.topologicalClosure := isClosed_closure.completeSpace_coe /-- A maximal proper subspace of a topological module (i.e a `Submodule` satisfying `IsCoatom`) is either closed or dense. -/ theorem Submodule.isClosed_or_dense_of_isCoatom (s : Submodule R M) (hs : IsCoatom s) : IsClosed (s : Set M) ∨ Dense (s : Set M) := by refine (hs.le_iff.mp s.le_topologicalClosure).symm.imp ?_ dense_iff_topologicalClosure_eq_top.mpr exact fun h ↦ h ▸ isClosed_closure end closure namespace Submodule variable {ι R : Type} {M : ι → Type} [Semiring R] [∀ i, AddCommMonoid (M i)] [∀ i, Module R (M i)] [∀ i, TopologicalSpace (M i)] [DecidableEq ι] /-- If `s i` is a family of submodules, each is in its module, then the closure of their span in the indexed product of the modules is the product of their closures. In case of a finite index type, this statement immediately follows from `Submodule.iSup_map_single`. However, the statement is true for an infinite index type as well. -/ theorem closure_coe_iSup_map_single (s : ∀ i, Submodule R (M i)) : closure (↑(⨆ i, (s i).map (LinearMap.single R M i)) : Set (∀ i, M i)) = Set.univ.pi fun i ↦ closure (s i) := by rw [← closure_pi_set] refine (closure_mono ?_).antisymm <\| closure_minimal ?_ isClosed_closure · exact SetLike.coe_mono <\| iSup_map_single_le · simp only [Set.subset_def, mem_closure_iff] intro x hx U hU hxU rcases isOpen_pi_iff.mp hU x hxU with ⟨t, V, hV, hVU⟩ refine ⟨∑ i ∈ t, Pi.single i (x i), hVU ?_, ?_⟩ · simp_all [Finset.sum_pi_single] · exact sum_mem fun i hi ↦ mem_iSup_of_mem i <\| mem_map_of_mem <\| hx _ <\| Set.mem_univ _ /-- If `s i` is a family of submodules, each is in its module, then the closure of their span in the indexed product of the modules is the product of their closures. In case of a finite index type, this statement immediately follows from `Submodule.iSup_map_single`. However, the statement is true for an infinite index type as well. This version is stated in terms of `Submodule.topologicalClosure`, thus assumes that `M i`s are topological modules over `R`. However, the statement is true without assuming continuity of the operations, see `Submodule.closure_coe_iSup_map_single` above. -/ theorem topologicalClosure_iSup_map_single [∀ i, ContinuousAdd (M i)] [∀ i, ContinuousConstSMul R (M i)] (s : ∀ i, Submodule R (M i)) : topologicalClosure (⨆ i, (s i).map (LinearMap.single R M i)) = pi Set.univ fun i ↦ (s i).topologicalClosure := SetLike.coe_injective <\| closure_coe_iSup_map_single _ end Submodule section Pi theorem LinearMap.continuous_on_pi {ι : Type} {R : Type} {M : Type} [Finite ι] [Semiring R] [TopologicalSpace R] [AddCommMonoid M] [Module R M] [TopologicalSpace M] [ContinuousAdd M] [ContinuousSMul R M] (f : (ι → R) →ₗ[R] M) : Continuous f := by cases nonempty_fintype ι classical -- for the proof, write `f` in the standard basis, and use that each coordinate is a continuous -- function. have : (f : (ι → R) → M) = fun x => ∑ i : ι, x i • f fun j => if i = j then 1 else 0 := by ext x exact f.pi_apply_eq_sum_univ x rw [this] refine continuous_finset_sum _ fun i _ => ?_ exact (continuous_apply i).smul continuous_const end Pi section PointwiseLimits variable {M₁ M₂ α R S : Type} [TopologicalSpace M₂] [T2Space M₂] [Semiring R] [Semiring S] [AddCommMonoid M₁] [AddCommMonoid M₂] [Module R M₁] [Module S M₂] [ContinuousConstSMul S M₂] variable [ContinuousAdd M₂] {σ : R →+ S} {l : Filter α} /-- Constructs a bundled linear map from a function and a proof that this function belongs to the closure of the set of linear maps. -/ @[simps -fullyApplied] def linearMapOfMemClosureRangeCoe (f : M₁ → M₂) (hf : f ∈ closure (Set.range ((↑) : (M₁ →ₛₗ[σ] M₂) → M₁ → M₂))) : M₁ →ₛₗ[σ] M₂ := { addMonoidHomOfMemClosureRangeCoe f hf with map_smul' := (isClosed_setOf_map_smul M₁ M₂ σ).closure_subset_iff.2 (Set.range_subset_iff.2 LinearMap.map_smulₛₗ) hf } /-- Construct a bundled linear map from a pointwise limit of linear maps -/ @[simps! -fullyApplied] def linearMapOfTendsto (f : M₁ → M₂) (g : α → M₁ →ₛₗ[σ] M₂) [l.NeBot] (h : Tendsto (fun a x => g a x) l (𝓝 f)) : M₁ →ₛₗ[σ] M₂ := linearMapOfMemClosureRangeCoe f <\| mem_closure_of_tendsto h <\| Eventually.of_forall fun _ => Set.mem_range_self _ variable (M₁ M₂ σ) theorem LinearMap.isClosed_range_coe : IsClosed (Set.range ((↑) : (M₁ →ₛₗ[σ] M₂) → M₁ → M₂)) := isClosed_of_closure_subset fun f hf => ⟨linearMapOfMemClosureRangeCoe f hf, rfl⟩ end PointwiseLimits section Quotient namespace Submodule variable {R M : Type*} [Ring R] [AddCommGroup M] [Module R M] [TopologicalSpace M] (S : Submodule R M) instance _root_.QuotientModule.Quotient.topologicalSpace : TopologicalSpace (M ⧸ S) := inferInstanceAs (TopologicalSpace (Quotient S.quotientRel)) theorem isOpenMap_mkQ [ContinuousAdd M] : IsOpenMap S.mkQ := QuotientAddGroup.isOpenMap_coe theorem isOpenQuotientMap_mkQ [ContinuousAdd M] : IsOpenQuotientMap S.mkQ := QuotientAddGroup.isOpenQuotientMap_mk instance topologicalAddGroup_quotient [IsTopologicalAddGroup M] : IsTopologicalAddGroup (M ⧸ S) := inferInstanceAs <\| IsTopologicalAddGroup (M ⧸ S.toAddSubgroup) instance continuousSMul_quotient [TopologicalSpace R] [IsTopologicalAddGroup M] [ContinuousSMul R M] : ContinuousSMul R (M ⧸ S) where continuous_smul := by rw [← (IsOpenQuotientMap.id.prodMap S.isOpenQuotientMap_mkQ).continuous_comp_iff] exact continuous_quot_mk.comp continuous_smul instance t3_quotient_of_isClosed [IsTopologicalAddGroup M] [IsClosed (S : Set M)] : T3Space (M ⧸ S) := letI : IsClosed (S.toAddSubgroup : Set M) := ‹_› QuotientAddGroup.instT3Space S.toAddSubgroup end Submodule end Quotient		Mathlib/Topology/Algebra/Module/Basic.lean	1,567	1,570
/- Copyright (c) 2020 Johan Commelin. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johan Commelin, Robert Y. Lewis -/ import Mathlib.RingTheory.WittVector.InitTail /-! # Truncated Witt vectors The ring of truncated Witt vectors (of length `n`) is a quotient of the ring of Witt vectors. It retains the first `n` coefficients of each Witt vector. In this file, we set up the basic quotient API for this ring. The ring of Witt vectors is the projective limit of all the rings of truncated Witt vectors. ## Main declarations - `TruncatedWittVector`: the underlying type of the ring of truncated Witt vectors - `TruncatedWittVector.instCommRing`: the ring structure on truncated Witt vectors - `WittVector.truncate`: the quotient homomorphism that truncates a Witt vector, to obtain a truncated Witt vector - `TruncatedWittVector.truncate`: the homomorphism that truncates a truncated Witt vector of length `n` to one of length `m` (for some `m ≤ n`) - `WittVector.lift`: the unique ring homomorphism into the ring of Witt vectors that is compatible with a family of ring homomorphisms to the truncated Witt vectors: this realizes the ring of Witt vectors as projective limit of the rings of truncated Witt vectors ## References * [Hazewinkel, Witt Vectors][Haze09] * [Commelin and Lewis, Formalizing the Ring of Witt Vectors][CL21] -/ open Function (Injective Surjective) noncomputable section variable {p : ℕ} (n : ℕ) (R : Type) local notation "𝕎" => WittVector p -- type as `\bbW` /-- A truncated Witt vector over `R` is a vector of elements of `R`, i.e., the first `n` coefficients of a Witt vector. We will define operations on this type that are compatible with the (untruncated) Witt vector operations. `TruncatedWittVector p n R` takes a parameter `p : ℕ` that is not used in the definition. In practice, this number `p` is assumed to be a prime number, and under this assumption we construct a ring structure on `TruncatedWittVector p n R`. (`TruncatedWittVector p₁ n R` and `TruncatedWittVector p₂ n R` are definitionally equal as types but will have different ring operations.) -/ @[nolint unusedArguments] def TruncatedWittVector (_ : ℕ) (n : ℕ) (R : Type) := Fin n → R instance (p n : ℕ) (R : Type*) [Inhabited R] : Inhabited (TruncatedWittVector p n R) := ⟨fun _ => default⟩ variable {n R} namespace TruncatedWittVector variable (p) in /-- Create a `TruncatedWittVector` from a vector `x`. -/ def mk (x : Fin n → R) : TruncatedWittVector p n R := x /-- `x.coeff i` is the `i`th entry of `x`. -/ def coeff (i : Fin n) (x : TruncatedWittVector p n R) : R := x i @[ext] theorem ext {x y : TruncatedWittVector p n R} (h : ∀ i, x.coeff i = y.coeff i) : x = y := funext h @[simp] theorem coeff_mk (x : Fin n → R) (i : Fin n) : (mk p x).coeff i = x i := rfl @[simp] theorem mk_coeff (x : TruncatedWittVector p n R) : (mk p fun i => x.coeff i) = x := by ext i; rw [coeff_mk] variable [CommRing R] /-- We can turn a truncated Witt vector `x` into a Witt vector by setting all coefficients after `x` to be 0. -/ def out (x : TruncatedWittVector p n R) : 𝕎 R := @WittVector.mk' p _ fun i => if h : i < n then x.coeff ⟨i, h⟩ else 0 @[simp] theorem coeff_out (x : TruncatedWittVector p n R) (i : Fin n) : x.out.coeff i = x.coeff i := by rw [out]; dsimp only; rw [dif_pos i.is_lt, Fin.eta] theorem out_injective : Injective (@out p n R _) := by intro x y h ext i rw [WittVector.ext_iff] at h simpa only [coeff_out] using h ↑i end TruncatedWittVector namespace WittVector variable (n) section	/-- `truncateFun n x` uses the first `n` entries of `x` to construct a `TruncatedWittVector`,	Mathlib/RingTheory/WittVector/Truncated.lean	114	115
/- 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 -/ import Mathlib.Algebra.CharP.Defs import Mathlib.Algebra.Order.CauSeq.BigOperators import Mathlib.Algebra.Order.Star.Basic import Mathlib.Data.Complex.BigOperators import Mathlib.Data.Complex.Norm import Mathlib.Data.Nat.Choose.Sum /-! # Exponential Function This file contains the definitions of the real and complex exponential function. ## Main definitions * `Complex.exp`: The complex exponential function, defined via its Taylor series * `Real.exp`: The real exponential function, defined as the real part of the complex exponential -/ open CauSeq Finset IsAbsoluteValue open scoped ComplexConjugate namespace Complex theorem isCauSeq_norm_exp (z : ℂ) : IsCauSeq abs fun n => ∑ m ∈ range n, ‖z ^ m / m.factorial‖ := let ⟨n, hn⟩ := exists_nat_gt ‖z‖ have hn0 : (0 : ℝ) < n := lt_of_le_of_lt (norm_nonneg _) hn IsCauSeq.series_ratio_test n (‖z‖ / n) (div_nonneg (norm_nonneg _) (le_of_lt hn0)) (by rwa [div_lt_iff₀ hn0, one_mul]) fun m hm => by rw [abs_norm, abs_norm, Nat.factorial_succ, pow_succ', mul_comm m.succ, Nat.cast_mul, ← div_div, mul_div_assoc, mul_div_right_comm, Complex.norm_mul, Complex.norm_div, norm_natCast] gcongr exact le_trans hm (Nat.le_succ _) @[deprecated (since := "2025-02-16")] alias isCauSeq_abs_exp := isCauSeq_norm_exp noncomputable section theorem isCauSeq_exp (z : ℂ) : IsCauSeq (‖·‖) fun n => ∑ m ∈ range n, z ^ m / m.factorial := (isCauSeq_norm_exp z).of_abv /-- The Cauchy sequence consisting of partial sums of the Taylor series of the complex exponential function -/ @[pp_nodot] def exp' (z : ℂ) : CauSeq ℂ (‖·‖) := ⟨fun n => ∑ m ∈ range n, z ^ m / m.factorial, isCauSeq_exp z⟩ /-- The complex exponential function, defined via its Taylor series -/ @[pp_nodot] def exp (z : ℂ) : ℂ := CauSeq.lim (exp' z) /-- scoped notation for the complex exponential function -/ scoped notation "cexp" => Complex.exp end end Complex namespace Real open Complex noncomputable section /-- The real exponential function, defined as the real part of the complex exponential -/ @[pp_nodot] nonrec def exp (x : ℝ) : ℝ := (exp x).re /-- scoped notation for the real exponential function -/ scoped notation "rexp" => Real.exp end end Real namespace Complex variable (x y : ℂ) @[simp] theorem exp_zero : exp 0 = 1 := by rw [exp] refine lim_eq_of_equiv_const fun ε ε0 => ⟨1, fun j hj => ?_⟩ convert (config := .unfoldSameFun) ε0 -- ε0 : ε > 0 but goal is _ < ε rcases j with - \| j · exact absurd hj (not_le_of_gt zero_lt_one) · dsimp [exp'] induction' j with j ih · dsimp [exp']; simp [show Nat.succ 0 = 1 from rfl] · rw [← ih (by simp [Nat.succ_le_succ])] simp only [sum_range_succ, pow_succ] simp theorem exp_add : exp (x + y) = exp x * exp y := by have hj : ∀ j : ℕ, (∑ m ∈ range j, (x + y) ^ m / m.factorial) = ∑ i ∈ range j, ∑ k ∈ range (i + 1), x ^ k / k.factorial * (y ^ (i - k) / (i - k).factorial) := by intro j refine Finset.sum_congr rfl fun m _ => ?_ rw [add_pow, div_eq_mul_inv, sum_mul] refine Finset.sum_congr rfl fun I hi => ?_ have h₁ : (m.choose I : ℂ) ≠ 0 := Nat.cast_ne_zero.2 (pos_iff_ne_zero.1 (Nat.choose_pos (Nat.le_of_lt_succ (mem_range.1 hi)))) have h₂ := Nat.choose_mul_factorial_mul_factorial (Nat.le_of_lt_succ <\| Finset.mem_range.1 hi) rw [← h₂, Nat.cast_mul, Nat.cast_mul, mul_inv, mul_inv] simp only [mul_left_comm (m.choose I : ℂ), mul_assoc, mul_left_comm (m.choose I : ℂ)⁻¹, mul_comm (m.choose I : ℂ)] rw [inv_mul_cancel₀ h₁] simp [div_eq_mul_inv, mul_comm, mul_assoc, mul_left_comm] simp_rw [exp, exp', lim_mul_lim] apply (lim_eq_lim_of_equiv _).symm simp only [hj] exact cauchy_product (isCauSeq_norm_exp x) (isCauSeq_exp y) /-- the exponential function as a monoid hom from `Multiplicative ℂ` to `ℂ` -/ @[simps] noncomputable def expMonoidHom : MonoidHom (Multiplicative ℂ) ℂ := { toFun := fun z => exp z.toAdd, map_one' := by simp, map_mul' := by simp [exp_add] } theorem exp_list_sum (l : List ℂ) : exp l.sum = (l.map exp).prod := map_list_prod (M := Multiplicative ℂ) expMonoidHom l theorem exp_multiset_sum (s : Multiset ℂ) : exp s.sum = (s.map exp).prod := @MonoidHom.map_multiset_prod (Multiplicative ℂ) ℂ _ _ expMonoidHom s theorem exp_sum {α : Type} (s : Finset α) (f : α → ℂ) : exp (∑ x ∈ s, f x) = ∏ x ∈ s, exp (f x) := map_prod (β := Multiplicative ℂ) expMonoidHom f s lemma exp_nsmul (x : ℂ) (n : ℕ) : exp (n • x) = exp x ^ n := @MonoidHom.map_pow (Multiplicative ℂ) ℂ _ _ expMonoidHom _ _ theorem exp_nat_mul (x : ℂ) : ∀ n : ℕ, exp (n x) = exp x ^ n \| 0 => by rw [Nat.cast_zero, zero_mul, exp_zero, pow_zero] \| Nat.succ n => by rw [pow_succ, Nat.cast_add_one, add_mul, exp_add, ← exp_nat_mul _ n, one_mul] @[simp] theorem exp_ne_zero : exp x ≠ 0 := fun h => zero_ne_one (α := ℂ) <\| by rw [← exp_zero, ← add_neg_cancel x, exp_add, h]; simp theorem exp_neg : exp (-x) = (exp x)⁻¹ := by rw [← mul_right_inj' (exp_ne_zero x), ← exp_add]; simp [mul_inv_cancel₀ (exp_ne_zero x)] theorem exp_sub : exp (x - y) = exp x / exp y := by simp [sub_eq_add_neg, exp_add, exp_neg, div_eq_mul_inv] theorem exp_int_mul (z : ℂ) (n : ℤ) : Complex.exp (n * z) = Complex.exp z ^ n := by cases n · simp [exp_nat_mul] · simp [exp_add, add_mul, pow_add, exp_neg, exp_nat_mul] @[simp] theorem exp_conj : exp (conj x) = conj (exp x) := by dsimp [exp] rw [← lim_conj] refine congr_arg CauSeq.lim (CauSeq.ext fun _ => ?_) dsimp [exp', Function.comp_def, cauSeqConj] rw [map_sum (starRingEnd _)] refine sum_congr rfl fun n _ => ?_ rw [map_div₀, map_pow, ← ofReal_natCast, conj_ofReal] @[simp] theorem ofReal_exp_ofReal_re (x : ℝ) : ((exp x).re : ℂ) = exp x := conj_eq_iff_re.1 <\| by rw [← exp_conj, conj_ofReal] @[simp, norm_cast] theorem ofReal_exp (x : ℝ) : (Real.exp x : ℂ) = exp x := ofReal_exp_ofReal_re _ @[simp] theorem exp_ofReal_im (x : ℝ) : (exp x).im = 0 := by rw [← ofReal_exp_ofReal_re, ofReal_im] theorem exp_ofReal_re (x : ℝ) : (exp x).re = Real.exp x := rfl end Complex namespace Real open Complex variable (x y : ℝ) @[simp] theorem exp_zero : exp 0 = 1 := by simp [Real.exp] nonrec theorem exp_add : exp (x + y) = exp x * exp y := by simp [exp_add, exp] /-- the exponential function as a monoid hom from `Multiplicative ℝ` to `ℝ` -/ @[simps] noncomputable def expMonoidHom : MonoidHom (Multiplicative ℝ) ℝ := { toFun := fun x => exp x.toAdd, map_one' := by simp, map_mul' := by simp [exp_add] } theorem exp_list_sum (l : List ℝ) : exp l.sum = (l.map exp).prod := map_list_prod (M := Multiplicative ℝ) expMonoidHom l theorem exp_multiset_sum (s : Multiset ℝ) : exp s.sum = (s.map exp).prod := @MonoidHom.map_multiset_prod (Multiplicative ℝ) ℝ _ _ expMonoidHom s theorem exp_sum {α : Type} (s : Finset α) (f : α → ℝ) : exp (∑ x ∈ s, f x) = ∏ x ∈ s, exp (f x) := map_prod (β := Multiplicative ℝ) expMonoidHom f s lemma exp_nsmul (x : ℝ) (n : ℕ) : exp (n • x) = exp x ^ n := @MonoidHom.map_pow (Multiplicative ℝ) ℝ _ _ expMonoidHom _ _ nonrec theorem exp_nat_mul (x : ℝ) (n : ℕ) : exp (n x) = exp x ^ n := ofReal_injective (by simp [exp_nat_mul]) @[simp] nonrec theorem exp_ne_zero : exp x ≠ 0 := fun h => exp_ne_zero x <\| by rw [exp, ← ofReal_inj] at h; simp_all nonrec theorem exp_neg : exp (-x) = (exp x)⁻¹ := ofReal_injective <\| by simp [exp_neg] theorem exp_sub : exp (x - y) = exp x / exp y := by simp [sub_eq_add_neg, exp_add, exp_neg, div_eq_mul_inv] open IsAbsoluteValue Nat theorem sum_le_exp_of_nonneg {x : ℝ} (hx : 0 ≤ x) (n : ℕ) : ∑ i ∈ range n, x ^ i / i ! ≤ exp x := calc ∑ i ∈ range n, x ^ i / i ! ≤ lim (⟨_, isCauSeq_re (exp' x)⟩ : CauSeq ℝ abs) := by refine le_lim (CauSeq.le_of_exists ⟨n, fun j hj => ?_⟩) simp only [exp', const_apply, re_sum] norm_cast refine sum_le_sum_of_subset_of_nonneg (range_mono hj) fun _ _ _ ↦ ?_ positivity _ = exp x := by rw [exp, Complex.exp, ← cauSeqRe, lim_re] lemma pow_div_factorial_le_exp (hx : 0 ≤ x) (n : ℕ) : x ^ n / n ! ≤ exp x := calc x ^ n / n ! ≤ ∑ k ∈ range (n + 1), x ^ k / k ! := single_le_sum (f := fun k ↦ x ^ k / k !) (fun k _ ↦ by positivity) (self_mem_range_succ n) _ ≤ exp x := sum_le_exp_of_nonneg hx _ theorem quadratic_le_exp_of_nonneg {x : ℝ} (hx : 0 ≤ x) : 1 + x + x ^ 2 / 2 ≤ exp x := calc 1 + x + x ^ 2 / 2 = ∑ i ∈ range 3, x ^ i / i ! := by simp only [sum_range_succ, range_one, sum_singleton, _root_.pow_zero, factorial, cast_one, ne_eq, one_ne_zero, not_false_eq_true, div_self, pow_one, mul_one, div_one, Nat.mul_one, cast_succ, add_right_inj] ring_nf _ ≤ exp x := sum_le_exp_of_nonneg hx 3 private theorem add_one_lt_exp_of_pos {x : ℝ} (hx : 0 < x) : x + 1 < exp x := (by nlinarith : x + 1 < 1 + x + x ^ 2 / 2).trans_le (quadratic_le_exp_of_nonneg hx.le) private theorem add_one_le_exp_of_nonneg {x : ℝ} (hx : 0 ≤ x) : x + 1 ≤ exp x := by rcases eq_or_lt_of_le hx with (rfl \| h) · simp exact (add_one_lt_exp_of_pos h).le theorem one_le_exp {x : ℝ} (hx : 0 ≤ x) : 1 ≤ exp x := by linarith [add_one_le_exp_of_nonneg hx] @[bound] theorem exp_pos (x : ℝ) : 0 < exp x := (le_total 0 x).elim (lt_of_lt_of_le zero_lt_one ∘ one_le_exp) fun h => by rw [← neg_neg x, Real.exp_neg] exact inv_pos.2 (lt_of_lt_of_le zero_lt_one (one_le_exp (neg_nonneg.2 h))) @[bound] lemma exp_nonneg (x : ℝ) : 0 ≤ exp x := x.exp_pos.le @[simp] theorem abs_exp (x : ℝ) : \|exp x\| = exp x := abs_of_pos (exp_pos _) lemma exp_abs_le (x : ℝ) : exp \|x\| ≤ exp x + exp (-x) := by cases le_total x 0 <;> simp [abs_of_nonpos, abs_of_nonneg, exp_nonneg, ] @[mono] theorem exp_strictMono : StrictMono exp := fun x y h => by rw [← sub_add_cancel y x, Real.exp_add] exact (lt_mul_iff_one_lt_left (exp_pos _)).2 (lt_of_lt_of_le (by linarith) (add_one_le_exp_of_nonneg (by linarith))) @[gcongr] theorem exp_lt_exp_of_lt {x y : ℝ} (h : x < y) : exp x < exp y := exp_strictMono h @[mono] theorem exp_monotone : Monotone exp := exp_strictMono.monotone @[gcongr, bound] theorem exp_le_exp_of_le {x y : ℝ} (h : x ≤ y) : exp x ≤ exp y := exp_monotone h @[simp] theorem exp_lt_exp {x y : ℝ} : exp x < exp y ↔ x < y := exp_strictMono.lt_iff_lt @[simp] theorem exp_le_exp {x y : ℝ} : exp x ≤ exp y ↔ x ≤ y := exp_strictMono.le_iff_le theorem exp_injective : Function.Injective exp := exp_strictMono.injective @[simp] theorem exp_eq_exp {x y : ℝ} : exp x = exp y ↔ x = y := exp_injective.eq_iff @[simp] theorem exp_eq_one_iff : exp x = 1 ↔ x = 0 := exp_injective.eq_iff' exp_zero @[simp] theorem one_lt_exp_iff {x : ℝ} : 1 < exp x ↔ 0 < x := by rw [← exp_zero, exp_lt_exp] @[bound] private alias ⟨_, Bound.one_lt_exp_of_pos⟩ := one_lt_exp_iff @[simp] theorem exp_lt_one_iff {x : ℝ} : exp x < 1 ↔ x < 0 := by rw [← exp_zero, exp_lt_exp] @[simp] theorem exp_le_one_iff {x : ℝ} : exp x ≤ 1 ↔ x ≤ 0 := exp_zero ▸ exp_le_exp @[simp] theorem one_le_exp_iff {x : ℝ} : 1 ≤ exp x ↔ 0 ≤ x := exp_zero ▸ exp_le_exp end Real namespace Complex theorem sum_div_factorial_le {α : Type} [Field α] [LinearOrder α] [IsStrictOrderedRing α] (n j : ℕ) (hn : 0 < n) : (∑ m ∈ range j with n ≤ m, (1 / m.factorial : α)) ≤ n.succ / (n.factorial * n) := calc (∑ m ∈ range j with n ≤ m, (1 / m.factorial : α)) = ∑ m ∈ range (j - n), (1 / ((m + n).factorial : α)) := by refine sum_nbij' (· - n) (· + n) ?_ ?_ ?_ ?_ ?_ <;> simp +contextual [lt_tsub_iff_right, tsub_add_cancel_of_le] _ ≤ ∑ m ∈ range (j - n), ((n.factorial : α) * (n.succ : α) ^ m)⁻¹ := by simp_rw [one_div] gcongr rw [← Nat.cast_pow, ← Nat.cast_mul, Nat.cast_le, add_comm] exact Nat.factorial_mul_pow_le_factorial _ = (n.factorial : α)⁻¹ * ∑ m ∈ range (j - n), (n.succ : α)⁻¹ ^ m := by simp [mul_inv, ← mul_sum, ← sum_mul, mul_comm, inv_pow] _ = ((n.succ : α) - n.succ * (n.succ : α)⁻¹ ^ (j - n)) / (n.factorial * n) := by have h₁ : (n.succ : α) ≠ 1 := @Nat.cast_one α _ ▸ mt Nat.cast_inj.1 (mt Nat.succ.inj (pos_iff_ne_zero.1 hn)) have h₂ : (n.succ : α) ≠ 0 := by positivity have h₃ : (n.factorial * n : α) ≠ 0 := by positivity have h₄ : (n.succ - 1 : α) = n := by simp rw [geom_sum_inv h₁ h₂, eq_div_iff_mul_eq h₃, mul_comm _ (n.factorial * n : α), ← mul_assoc (n.factorial⁻¹ : α), ← mul_inv_rev, h₄, ← mul_assoc (n.factorial * n : α), mul_comm (n : α) n.factorial, mul_inv_cancel₀ h₃, one_mul, mul_comm] _ ≤ n.succ / (n.factorial * n : α) := by gcongr; apply sub_le_self; positivity theorem exp_bound {x : ℂ} (hx : ‖x‖ ≤ 1) {n : ℕ} (hn : 0 < n) : ‖exp x - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ ‖x‖ ^ n * ((n.succ : ℝ) * (n.factorial * n : ℝ)⁻¹) := by rw [← lim_const (abv := norm) (∑ m ∈ range n, _), exp, sub_eq_add_neg, ← lim_neg, lim_add, ← lim_norm] refine lim_le (CauSeq.le_of_exists ⟨n, fun j hj => ?_⟩) simp_rw [← sub_eq_add_neg] show ‖(∑ m ∈ range j, x ^ m / m.factorial) - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ ‖x‖ ^ n * ((n.succ : ℝ) * (n.factorial * n : ℝ)⁻¹) rw [sum_range_sub_sum_range hj] calc ‖∑ m ∈ range j with n ≤ m, (x ^ m / m.factorial : ℂ)‖ = ‖∑ m ∈ range j with n ≤ m, (x ^ n * (x ^ (m - n) / m.factorial) : ℂ)‖ := by refine congr_arg norm (sum_congr rfl fun m hm => ?_) rw [mem_filter, mem_range] at hm rw [← mul_div_assoc, ← pow_add, add_tsub_cancel_of_le hm.2] _ ≤ ∑ m ∈ range j with n ≤ m, ‖x ^ n * (x ^ (m - n) / m.factorial)‖ := IsAbsoluteValue.abv_sum norm .. _ ≤ ∑ m ∈ range j with n ≤ m, ‖x‖ ^ n * (1 / m.factorial) := by simp_rw [Complex.norm_mul, Complex.norm_pow, Complex.norm_div, norm_natCast] gcongr rw [Complex.norm_pow] exact pow_le_one₀ (norm_nonneg _) hx _ = ‖x‖ ^ n * ∑ m ∈ range j with n ≤ m, (1 / m.factorial : ℝ) := by simp [abs_mul, abv_pow abs, abs_div, ← mul_sum] _ ≤ ‖x‖ ^ n * (n.succ * (n.factorial * n : ℝ)⁻¹) := by gcongr exact sum_div_factorial_le _ _ hn theorem exp_bound' {x : ℂ} {n : ℕ} (hx : ‖x‖ / n.succ ≤ 1 / 2) : ‖exp x - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ ‖x‖ ^ n / n.factorial * 2 := by rw [← lim_const (abv := norm) (∑ m ∈ range n, _), exp, sub_eq_add_neg, ← lim_neg, lim_add, ← lim_norm] refine lim_le (CauSeq.le_of_exists ⟨n, fun j hj => ?_⟩) simp_rw [← sub_eq_add_neg] show ‖(∑ m ∈ range j, x ^ m / m.factorial) - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ ‖x‖ ^ n / n.factorial * 2 let k := j - n have hj : j = n + k := (add_tsub_cancel_of_le hj).symm rw [hj, sum_range_add_sub_sum_range] calc ‖∑ i ∈ range k, x ^ (n + i) / ((n + i).factorial : ℂ)‖ ≤ ∑ i ∈ range k, ‖x ^ (n + i) / ((n + i).factorial : ℂ)‖ := IsAbsoluteValue.abv_sum _ _ _ _ ≤ ∑ i ∈ range k, ‖x‖ ^ (n + i) / (n + i).factorial := by simp [norm_natCast, Complex.norm_pow] _ ≤ ∑ i ∈ range k, ‖x‖ ^ (n + i) / ((n.factorial : ℝ) * (n.succ : ℝ) ^ i) := ?_ _ = ∑ i ∈ range k, ‖x‖ ^ n / n.factorial * (‖x‖ ^ i / (n.succ : ℝ) ^ i) := ?_ _ ≤ ‖x‖ ^ n / ↑n.factorial * 2 := ?_ · gcongr exact mod_cast Nat.factorial_mul_pow_le_factorial · refine Finset.sum_congr rfl fun _ _ => ?_ simp only [pow_add, div_eq_inv_mul, mul_inv, mul_left_comm, mul_assoc] · rw [← mul_sum] gcongr simp_rw [← div_pow] rw [geom_sum_eq, div_le_iff_of_neg] · trans (-1 : ℝ) · linarith · simp only [neg_le_sub_iff_le_add, div_pow, Nat.cast_succ, le_add_iff_nonneg_left] positivity · linarith · linarith theorem norm_exp_sub_one_le {x : ℂ} (hx : ‖x‖ ≤ 1) : ‖exp x - 1‖ ≤ 2 * ‖x‖ := calc ‖exp x - 1‖ = ‖exp x - ∑ m ∈ range 1, x ^ m / m.factorial‖ := by simp [sum_range_succ] _ ≤ ‖x‖ ^ 1 * ((Nat.succ 1 : ℝ) * ((Nat.factorial 1) * (1 : ℕ) : ℝ)⁻¹) := (exp_bound hx (by decide)) _ = 2 * ‖x‖ := by simp [two_mul, mul_two, mul_add, mul_comm, add_mul, Nat.factorial] theorem norm_exp_sub_one_sub_id_le {x : ℂ} (hx : ‖x‖ ≤ 1) : ‖exp x - 1 - x‖ ≤ ‖x‖ ^ 2 := calc ‖exp x - 1 - x‖ = ‖exp x - ∑ m ∈ range 2, x ^ m / m.factorial‖ := by simp [sub_eq_add_neg, sum_range_succ_comm, add_assoc, Nat.factorial] _ ≤ ‖x‖ ^ 2 * ((Nat.succ 2 : ℝ) * (Nat.factorial 2 * (2 : ℕ) : ℝ)⁻¹) := (exp_bound hx (by decide)) _ ≤ ‖x‖ ^ 2 * 1 := by gcongr; norm_num [Nat.factorial] _ = ‖x‖ ^ 2 := by rw [mul_one] lemma norm_exp_sub_sum_le_exp_norm_sub_sum (x : ℂ) (n : ℕ) : ‖exp x - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ Real.exp ‖x‖ - ∑ m ∈ range n, ‖x‖ ^ m / m.factorial := by rw [← CauSeq.lim_const (abv := norm) (∑ m ∈ range n, _), Complex.exp, sub_eq_add_neg, ← CauSeq.lim_neg, CauSeq.lim_add, ← lim_norm] refine CauSeq.lim_le (CauSeq.le_of_exists ⟨n, fun j hj => ?_⟩) simp_rw [← sub_eq_add_neg] calc ‖(∑ m ∈ range j, x ^ m / m.factorial) - ∑ m ∈ range n, x ^ m / m.factorial‖ _ ≤ (∑ m ∈ range j, ‖x‖ ^ m / m.factorial) - ∑ m ∈ range n, ‖x‖ ^ m / m.factorial := by rw [sum_range_sub_sum_range hj, sum_range_sub_sum_range hj] refine (IsAbsoluteValue.abv_sum norm ..).trans_eq ?_ congr with i simp [Complex.norm_pow] _ ≤ Real.exp ‖x‖ - ∑ m ∈ range n, ‖x‖ ^ m / m.factorial := by gcongr exact Real.sum_le_exp_of_nonneg (norm_nonneg _) _ lemma norm_exp_le_exp_norm (x : ℂ) : ‖exp x‖ ≤ Real.exp ‖x‖ := by convert norm_exp_sub_sum_le_exp_norm_sub_sum x 0 using 1 <;> simp lemma norm_exp_sub_sum_le_norm_mul_exp (x : ℂ) (n : ℕ) : ‖exp x - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ ‖x‖ ^ n * Real.exp ‖x‖ := by rw [← CauSeq.lim_const (abv := norm) (∑ m ∈ range n, _), Complex.exp, sub_eq_add_neg, ← CauSeq.lim_neg, CauSeq.lim_add, ← lim_norm] refine CauSeq.lim_le (CauSeq.le_of_exists ⟨n, fun j hj => ?_⟩) simp_rw [← sub_eq_add_neg] show ‖(∑ m ∈ range j, x ^ m / m.factorial) - ∑ m ∈ range n, x ^ m / m.factorial‖ ≤ _ rw [sum_range_sub_sum_range hj] calc ‖∑ m ∈ range j with n ≤ m, (x ^ m / m.factorial : ℂ)‖ = ‖∑ m ∈ range j with n ≤ m, (x ^ n * (x ^ (m - n) / m.factorial) : ℂ)‖ := by refine congr_arg norm (sum_congr rfl fun m hm => ?_) rw [mem_filter, mem_range] at hm rw [← mul_div_assoc, ← pow_add, add_tsub_cancel_of_le hm.2] _ ≤ ∑ m ∈ range j with n ≤ m, ‖x ^ n * (x ^ (m - n) / m.factorial)‖ := IsAbsoluteValue.abv_sum norm .. _ ≤ ∑ m ∈ range j with n ≤ m, ‖x‖ ^ n * (‖x‖ ^ (m - n) / (m - n).factorial) := by simp_rw [Complex.norm_mul, Complex.norm_pow, Complex.norm_div, norm_natCast] gcongr with i hi · rw [Complex.norm_pow] · simp _ = ‖x‖ ^ n * ∑ m ∈ range j with n ≤ m, (‖x‖ ^ (m - n) / (m - n).factorial) := by rw [← mul_sum] _ = ‖x‖ ^ n * ∑ m ∈ range (j - n), (‖x‖ ^ m / m.factorial) := by congr 1 refine (sum_bij (fun m hm ↦ m + n) ?_ ?_ ?_ ?_).symm · intro a ha simp only [mem_filter, mem_range, le_add_iff_nonneg_left, zero_le, and_true] simp only [mem_range] at ha rwa [← lt_tsub_iff_right] · intro a ha b hb hab simpa using hab · intro b hb simp only [mem_range, exists_prop] simp only [mem_filter, mem_range] at hb refine ⟨b - n, ?_, ?_⟩ · rw [tsub_lt_tsub_iff_right hb.2] exact hb.1 · rw [tsub_add_cancel_of_le hb.2] · simp _ ≤ ‖x‖ ^ n * Real.exp ‖x‖ := by gcongr refine Real.sum_le_exp_of_nonneg ?_ _ exact norm_nonneg _ @[deprecated (since := "2025-02-16")] alias abs_exp_sub_one_le := norm_exp_sub_one_le @[deprecated (since := "2025-02-16")] alias abs_exp_sub_one_sub_id_le := norm_exp_sub_one_sub_id_le @[deprecated (since := "2025-02-16")] alias abs_exp_sub_sum_le_exp_abs_sub_sum := norm_exp_sub_sum_le_exp_norm_sub_sum @[deprecated (since := "2025-02-16")] alias abs_exp_le_exp_abs := norm_exp_le_exp_norm @[deprecated (since := "2025-02-16")] alias abs_exp_sub_sum_le_abs_mul_exp := norm_exp_sub_sum_le_norm_mul_exp end Complex namespace Real open Complex Finset nonrec theorem exp_bound {x : ℝ} (hx : \|x\| ≤ 1) {n : ℕ} (hn : 0 < n) : \|exp x - ∑ m ∈ range n, x ^ m / m.factorial\| ≤ \|x\| ^ n * (n.succ / (n.factorial * n)) := by have hxc : ‖(x : ℂ)‖ ≤ 1 := mod_cast hx convert exp_bound hxc hn using 2 <;> norm_cast theorem exp_bound' {x : ℝ} (h1 : 0 ≤ x) (h2 : x ≤ 1) {n : ℕ} (hn : 0 < n) : Real.exp x ≤ (∑ m ∈ Finset.range n, x ^ m / m.factorial) + x ^ n * (n + 1) / (n.factorial * n) := by have h3 : \|x\| = x := by simpa have h4 : \|x\| ≤ 1 := by rwa [h3] have h' := Real.exp_bound h4 hn rw [h3] at h' have h'' := (abs_sub_le_iff.1 h').1 have t := sub_le_iff_le_add'.1 h'' simpa [mul_div_assoc] using t theorem abs_exp_sub_one_le {x : ℝ} (hx : \|x\| ≤ 1) : \|exp x - 1\| ≤ 2 * \|x\| := by have : ‖(x : ℂ)‖ ≤ 1 := mod_cast hx exact_mod_cast Complex.norm_exp_sub_one_le (x := x) this theorem abs_exp_sub_one_sub_id_le {x : ℝ} (hx : \|x\| ≤ 1) : \|exp x - 1 - x\| ≤ x ^ 2 := by rw [← sq_abs] have : ‖(x : ℂ)‖ ≤ 1 := mod_cast hx exact_mod_cast Complex.norm_exp_sub_one_sub_id_le this /-- A finite initial segment of the exponential series, followed by an arbitrary tail. For fixed `n` this is just a linear map wrt `r`, and each map is a simple linear function of the previous (see `expNear_succ`), with `expNear n x r ⟶ exp x` as `n ⟶ ∞`, for any `r`. -/ noncomputable def expNear (n : ℕ) (x r : ℝ) : ℝ := (∑ m ∈ range n, x ^ m / m.factorial) + x ^ n / n.factorial * r @[simp] theorem expNear_zero (x r) : expNear 0 x r = r := by simp [expNear] @[simp] theorem expNear_succ (n x r) : expNear (n + 1) x r = expNear n x (1 + x / (n + 1) * r) := by simp [expNear, range_succ, mul_add, add_left_comm, add_assoc, pow_succ, div_eq_mul_inv, mul_inv, Nat.factorial] ac_rfl theorem expNear_sub (n x r₁ r₂) : expNear n x r₁ - expNear n x r₂ = x ^ n / n.factorial * (r₁ - r₂) := by simp [expNear, mul_sub] theorem exp_approx_end (n m : ℕ) (x : ℝ) (e₁ : n + 1 = m) (h : \|x\| ≤ 1) : \|exp x - expNear m x 0\| ≤ \|x\| ^ m / m.factorial * ((m + 1) / m) := by simp only [expNear, mul_zero, add_zero] convert exp_bound (n := m) h ?_ using 1 · field_simp [mul_comm] · omega theorem exp_approx_succ {n} {x a₁ b₁ : ℝ} (m : ℕ) (e₁ : n + 1 = m) (a₂ b₂ : ℝ) (e : \|1 + x / m * a₂ - a₁\| ≤ b₁ - \|x\| / m * b₂) (h : \|exp x - expNear m x a₂\| ≤ \|x\| ^ m / m.factorial * b₂) : \|exp x - expNear n x a₁\| ≤ \|x\| ^ n / n.factorial * b₁ := by refine (abs_sub_le _ _ _).trans ((add_le_add_right h _).trans ?_) subst e₁; rw [expNear_succ, expNear_sub, abs_mul] convert mul_le_mul_of_nonneg_left (a := \|x\| ^ n / ↑(Nat.factorial n)) (le_sub_iff_add_le'.1 e) ?_ using 1 · simp [mul_add, pow_succ', div_eq_mul_inv, abs_mul, abs_inv, ← pow_abs, mul_inv, Nat.factorial] ac_rfl · simp [div_nonneg, abs_nonneg] theorem exp_approx_end' {n} {x a b : ℝ} (m : ℕ) (e₁ : n + 1 = m) (rm : ℝ) (er : ↑m = rm) (h : \|x\| ≤ 1) (e : \|1 - a\| ≤ b - \|x\| / rm * ((rm + 1) / rm)) : \|exp x - expNear n x a\| ≤ \|x\| ^ n / n.factorial * b := by subst er exact exp_approx_succ _ e₁ _ _ (by simpa using e) (exp_approx_end _ _ _ e₁ h) theorem exp_1_approx_succ_eq {n} {a₁ b₁ : ℝ} {m : ℕ} (en : n + 1 = m) {rm : ℝ} (er : ↑m = rm) (h : \|exp 1 - expNear m 1 ((a₁ - 1) * rm)\| ≤ \|1\| ^ m / m.factorial * (b₁ * rm)) : \|exp 1 - expNear n 1 a₁\| ≤ \|1\| ^ n / n.factorial * b₁ := by subst er refine exp_approx_succ _ en _ _ ?_ h field_simp [show (m : ℝ) ≠ 0 by norm_cast; omega] theorem exp_approx_start (x a b : ℝ) (h : \|exp x - expNear 0 x a\| ≤ \|x\| ^ 0 / Nat.factorial 0 * b) : \|exp x - a\| ≤ b := by simpa using h theorem exp_bound_div_one_sub_of_interval' {x : ℝ} (h1 : 0 < x) (h2 : x < 1) : Real.exp x < 1 / (1 - x) := by have H : 0 < 1 - (1 + x + x ^ 2) * (1 - x) := calc 0 < x ^ 3 := by positivity _ = 1 - (1 + x + x ^ 2) * (1 - x) := by ring calc exp x ≤ _ := exp_bound' h1.le h2.le zero_lt_three _ ≤ 1 + x + x ^ 2 := by -- Porting note: was `norm_num [Finset.sum] <;> nlinarith` -- This proof should be restored after the norm_num plugin for big operators is ported. -- (It may also need the positivity extensions in https://github.com/leanprover-community/mathlib4/pull/3907.) rw [show 3 = 1 + 1 + 1 from rfl] repeat rw [Finset.sum_range_succ] norm_num [Nat.factorial] nlinarith _ < 1 / (1 - x) := by rw [lt_div_iff₀] <;> nlinarith theorem exp_bound_div_one_sub_of_interval {x : ℝ} (h1 : 0 ≤ x) (h2 : x < 1) : Real.exp x ≤ 1 / (1 - x) := by rcases eq_or_lt_of_le h1 with (rfl \| h1) · simp · exact (exp_bound_div_one_sub_of_interval' h1 h2).le theorem add_one_lt_exp {x : ℝ} (hx : x ≠ 0) : x + 1 < Real.exp x := by obtain hx \| hx := hx.symm.lt_or_lt · exact add_one_lt_exp_of_pos hx obtain h' \| h' := le_or_lt 1 (-x) · linarith [x.exp_pos] have hx' : 0 < x + 1 := by linarith simpa [add_comm, exp_neg, inv_lt_inv₀ (exp_pos _) hx'] using exp_bound_div_one_sub_of_interval' (neg_pos.2 hx) h' theorem add_one_le_exp (x : ℝ) : x + 1 ≤ Real.exp x := by obtain rfl \| hx := eq_or_ne x 0 · simp · exact (add_one_lt_exp hx).le lemma one_sub_lt_exp_neg {x : ℝ} (hx : x ≠ 0) : 1 - x < exp (-x) := (sub_eq_neg_add _ _).trans_lt <\| add_one_lt_exp <\| neg_ne_zero.2 hx lemma one_sub_le_exp_neg (x : ℝ) : 1 - x ≤ exp (-x) := (sub_eq_neg_add _ _).trans_le <\| add_one_le_exp _ theorem one_sub_div_pow_le_exp_neg {n : ℕ} {t : ℝ} (ht' : t ≤ n) : (1 - t / n) ^ n ≤ exp (-t) := by rcases eq_or_ne n 0 with (rfl \| hn) · simp rwa [Nat.cast_zero] at ht' calc (1 - t / n) ^ n ≤ rexp (-(t / n)) ^ n := by gcongr · exact sub_nonneg.2 <\| div_le_one_of_le₀ ht' n.cast_nonneg · exact one_sub_le_exp_neg _ _ = rexp (-t) := by rw [← Real.exp_nat_mul, mul_neg, mul_comm, div_mul_cancel₀]; positivity lemma le_inv_mul_exp (x : ℝ) {c : ℝ} (hc : 0 < c) : x ≤ c⁻¹ * exp (c * x) := by rw [le_inv_mul_iff₀ hc] calc c * x _ ≤ c * x + 1 := le_add_of_nonneg_right zero_le_one _ ≤ _ := Real.add_one_le_exp (c * x) end Real namespace Mathlib.Meta.Positivity open Lean.Meta Qq /-- Extension for the `positivity` tactic: `Real.exp` is always positive. -/ @[positivity Real.exp _] def evalExp : PositivityExt where eval {u α} _ _ e := do match u, α, e with \| 0, ~q(ℝ), ~q(Real.exp $a) => assertInstancesCommute pure (.positive q(Real.exp_pos $a)) \| _, _, _ => throwError "not Real.exp" end Mathlib.Meta.Positivity namespace Complex @[simp] theorem norm_exp_ofReal (x : ℝ) : ‖exp x‖ = Real.exp x := by rw [← ofReal_exp] exact Complex.norm_of_nonneg (le_of_lt (Real.exp_pos _)) @[deprecated (since := "2025-02-16")] alias abs_exp_ofReal := norm_exp_ofReal end Complex		Mathlib/Data/Complex/Exponential.lean	1,313	1,342
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mario Carneiro, Jeremy Avigad -/ import Mathlib.Data.Set.Finite.Basic import Mathlib.Data.Set.Finite.Range import Mathlib.Data.Set.Lattice import Mathlib.Topology.Defs.Filter /-! # Openness and closedness of a set This file provides lemmas relating to the predicates `IsOpen` and `IsClosed` of a set endowed with a topology. ## Implementation notes Topology in mathlib heavily uses filters (even more than in Bourbaki). See explanations in <https://leanprover-community.github.io/theories/topology.html>. ## References * [N. Bourbaki, General Topology][bourbaki1966] * [I. M. James, Topologies and Uniformities][james1999] ## Tags topological space -/ open Set Filter Topology universe u v /-- A constructor for topologies by specifying the closed sets, and showing that they satisfy the appropriate conditions. -/ def TopologicalSpace.ofClosed {X : Type u} (T : Set (Set X)) (empty_mem : ∅ ∈ T) (sInter_mem : ∀ A, A ⊆ T → ⋂₀ A ∈ T) (union_mem : ∀ A, A ∈ T → ∀ B, B ∈ T → A ∪ B ∈ T) : TopologicalSpace X where IsOpen X := Xᶜ ∈ T isOpen_univ := by simp [empty_mem] isOpen_inter s t hs ht := by simpa only [compl_inter] using union_mem sᶜ hs tᶜ ht isOpen_sUnion s hs := by simp only [Set.compl_sUnion] exact sInter_mem (compl '' s) fun z ⟨y, hy, hz⟩ => hz ▸ hs y hy section TopologicalSpace variable {X : Type u} {ι : Sort v} {α : Type} {x : X} {s s₁ s₂ t : Set X} {p p₁ p₂ : X → Prop} lemma isOpen_mk {p h₁ h₂ h₃} : IsOpen[⟨p, h₁, h₂, h₃⟩] s ↔ p s := Iff.rfl @[ext (iff := false)] protected theorem TopologicalSpace.ext : ∀ {f g : TopologicalSpace X}, IsOpen[f] = IsOpen[g] → f = g \| ⟨_, _, _, _⟩, ⟨_, _, _, _⟩, rfl => rfl protected theorem TopologicalSpace.ext_iff {t t' : TopologicalSpace X} : t = t' ↔ ∀ s, IsOpen[t] s ↔ IsOpen[t'] s := ⟨fun h _ => h ▸ Iff.rfl, fun h => by ext; exact h _⟩ theorem isOpen_fold {t : TopologicalSpace X} : t.IsOpen s = IsOpen[t] s := rfl variable [TopologicalSpace X] theorem isOpen_iUnion {f : ι → Set X} (h : ∀ i, IsOpen (f i)) : IsOpen (⋃ i, f i) := isOpen_sUnion (forall_mem_range.2 h) theorem isOpen_biUnion {s : Set α} {f : α → Set X} (h : ∀ i ∈ s, IsOpen (f i)) : IsOpen (⋃ i ∈ s, f i) := isOpen_iUnion fun i => isOpen_iUnion fun hi => h i hi theorem IsOpen.union (h₁ : IsOpen s₁) (h₂ : IsOpen s₂) : IsOpen (s₁ ∪ s₂) := by rw [union_eq_iUnion]; exact isOpen_iUnion (Bool.forall_bool.2 ⟨h₂, h₁⟩) lemma isOpen_iff_of_cover {f : α → Set X} (ho : ∀ i, IsOpen (f i)) (hU : (⋃ i, f i) = univ) : IsOpen s ↔ ∀ i, IsOpen (f i ∩ s) := by refine ⟨fun h i ↦ (ho i).inter h, fun h ↦ ?_⟩ rw [← s.inter_univ, inter_comm, ← hU, iUnion_inter] exact isOpen_iUnion fun i ↦ h i @[simp] theorem isOpen_empty : IsOpen (∅ : Set X) := by rw [← sUnion_empty]; exact isOpen_sUnion fun a => False.elim theorem Set.Finite.isOpen_sInter {s : Set (Set X)} (hs : s.Finite) (h : ∀ t ∈ s, IsOpen t) : IsOpen (⋂₀ s) := by induction s, hs using Set.Finite.induction_on with \| empty => rw [sInter_empty]; exact isOpen_univ \| insert _ _ ih => simp only [sInter_insert, forall_mem_insert] at h ⊢ exact h.1.inter (ih h.2) theorem Set.Finite.isOpen_biInter {s : Set α} {f : α → Set X} (hs : s.Finite) (h : ∀ i ∈ s, IsOpen (f i)) : IsOpen (⋂ i ∈ s, f i) := sInter_image f s ▸ (hs.image _).isOpen_sInter (forall_mem_image.2 h) theorem isOpen_iInter_of_finite [Finite ι] {s : ι → Set X} (h : ∀ i, IsOpen (s i)) : IsOpen (⋂ i, s i) := (finite_range _).isOpen_sInter (forall_mem_range.2 h) theorem isOpen_biInter_finset {s : Finset α} {f : α → Set X} (h : ∀ i ∈ s, IsOpen (f i)) : IsOpen (⋂ i ∈ s, f i) := s.finite_toSet.isOpen_biInter h @[simp] theorem isOpen_const {p : Prop} : IsOpen { _x : X \| p } := by by_cases p <;> simp [] theorem IsOpen.and : IsOpen { x \| p₁ x } → IsOpen { x \| p₂ x } → IsOpen { x \| p₁ x ∧ p₂ x } := IsOpen.inter @[simp] theorem isOpen_compl_iff : IsOpen sᶜ ↔ IsClosed s := ⟨fun h => ⟨h⟩, fun h => h.isOpen_compl⟩ theorem TopologicalSpace.ext_iff_isClosed {X} {t₁ t₂ : TopologicalSpace X} : t₁ = t₂ ↔ ∀ s, IsClosed[t₁] s ↔ IsClosed[t₂] s := by rw [TopologicalSpace.ext_iff, compl_surjective.forall] simp only [@isOpen_compl_iff _ _ t₁, @isOpen_compl_iff _ _ t₂] alias ⟨_, TopologicalSpace.ext_isClosed⟩ := TopologicalSpace.ext_iff_isClosed theorem isClosed_const {p : Prop} : IsClosed { _x : X \| p } := ⟨isOpen_const (p := ¬p)⟩ @[simp] theorem isClosed_empty : IsClosed (∅ : Set X) := isClosed_const @[simp] theorem isClosed_univ : IsClosed (univ : Set X) := isClosed_const lemma IsOpen.isLocallyClosed (hs : IsOpen s) : IsLocallyClosed s := ⟨_, _, hs, isClosed_univ, (inter_univ _).symm⟩ lemma IsClosed.isLocallyClosed (hs : IsClosed s) : IsLocallyClosed s := ⟨_, _, isOpen_univ, hs, (univ_inter _).symm⟩ theorem IsClosed.union : IsClosed s₁ → IsClosed s₂ → IsClosed (s₁ ∪ s₂) := by simpa only [← isOpen_compl_iff, compl_union] using IsOpen.inter theorem isClosed_sInter {s : Set (Set X)} : (∀ t ∈ s, IsClosed t) → IsClosed (⋂₀ s) := by simpa only [← isOpen_compl_iff, compl_sInter, sUnion_image] using isOpen_biUnion theorem isClosed_iInter {f : ι → Set X} (h : ∀ i, IsClosed (f i)) : IsClosed (⋂ i, f i) := isClosed_sInter <\| forall_mem_range.2 h theorem isClosed_biInter {s : Set α} {f : α → Set X} (h : ∀ i ∈ s, IsClosed (f i)) : IsClosed (⋂ i ∈ s, f i) := isClosed_iInter fun i => isClosed_iInter <\| h i @[simp] theorem isClosed_compl_iff {s : Set X} : IsClosed sᶜ ↔ IsOpen s := by rw [← isOpen_compl_iff, compl_compl] alias ⟨_, IsOpen.isClosed_compl⟩ := isClosed_compl_iff theorem IsOpen.sdiff (h₁ : IsOpen s) (h₂ : IsClosed t) : IsOpen (s \ t) := IsOpen.inter h₁ h₂.isOpen_compl theorem IsClosed.inter (h₁ : IsClosed s₁) (h₂ : IsClosed s₂) : IsClosed (s₁ ∩ s₂) := by rw [← isOpen_compl_iff] at * rw [compl_inter] exact IsOpen.union h₁ h₂ theorem IsClosed.sdiff (h₁ : IsClosed s) (h₂ : IsOpen t) : IsClosed (s \ t) := IsClosed.inter h₁ (isClosed_compl_iff.mpr h₂) theorem Set.Finite.isClosed_biUnion {s : Set α} {f : α → Set X} (hs : s.Finite) (h : ∀ i ∈ s, IsClosed (f i)) : IsClosed (⋃ i ∈ s, f i) := by simp only [← isOpen_compl_iff, compl_iUnion] at * exact hs.isOpen_biInter h lemma isClosed_biUnion_finset {s : Finset α} {f : α → Set X} (h : ∀ i ∈ s, IsClosed (f i)) : IsClosed (⋃ i ∈ s, f i) := s.finite_toSet.isClosed_biUnion h theorem isClosed_iUnion_of_finite [Finite ι] {s : ι → Set X} (h : ∀ i, IsClosed (s i)) : IsClosed (⋃ i, s i) := by simp only [← isOpen_compl_iff, compl_iUnion] at * exact isOpen_iInter_of_finite h theorem isClosed_imp {p q : X → Prop} (hp : IsOpen { x \| p x }) (hq : IsClosed { x \| q x }) : IsClosed { x \| p x → q x } := by simpa only [imp_iff_not_or] using hp.isClosed_compl.union hq theorem IsClosed.not : IsClosed { a \| p a } → IsOpen { a \| ¬p a } := isOpen_compl_iff.mpr /-! ### Limits of filters in topological spaces In this section we define functions that return a limit of a filter (or of a function along a filter), if it exists, and a random point otherwise. These functions are rarely used in Mathlib, most of the theorems are written using `Filter.Tendsto`. One of the reasons is that `Filter.limUnder f g = x` is not equivalent to `Filter.Tendsto g f (𝓝 x)` unless the codomain is a Hausdorff space and `g` has a limit along `f`. -/ section lim /-- If a filter `f` is majorated by some `𝓝 x`, then it is majorated by `𝓝 (Filter.lim f)`. We formulate this lemma with a `[Nonempty X]` argument of `lim` derived from `h` to make it useful for types without a `[Nonempty X]` instance. Because of the built-in proof irrelevance, Lean will unify this instance with any other instance. -/ theorem le_nhds_lim {f : Filter X} (h : ∃ x, f ≤ 𝓝 x) : f ≤ 𝓝 (@lim _ _ (nonempty_of_exists h) f) := Classical.epsilon_spec h /-- If `g` tends to some `𝓝 x` along `f`, then it tends to `𝓝 (Filter.limUnder f g)`. We formulate this lemma with a `[Nonempty X]` argument of `lim` derived from `h` to make it useful for types without a `[Nonempty X]` instance. Because of the built-in proof irrelevance, Lean will unify this instance with any other instance. -/ theorem tendsto_nhds_limUnder {f : Filter α} {g : α → X} (h : ∃ x, Tendsto g f (𝓝 x)) : Tendsto g f (𝓝 (@limUnder _ _ _ (nonempty_of_exists h) f g)) := le_nhds_lim h theorem limUnder_of_not_tendsto [hX : Nonempty X] {f : Filter α} {g : α → X} (h : ¬ ∃ x, Tendsto g f (𝓝 x)) : limUnder f g = Classical.choice hX := by simp_rw [Tendsto] at h simp_rw [limUnder, lim, Classical.epsilon, Classical.strongIndefiniteDescription, dif_neg h] end lim end TopologicalSpace		Mathlib/Topology/Basic.lean	1,120	1,128
/- Copyright (c) 2022 Cuma Kökmen. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Cuma Kökmen, Yury Kudryashov -/ import Mathlib.MeasureTheory.Integral.CircleIntegral import Mathlib.MeasureTheory.Integral.Prod import Mathlib.Order.Fin.Tuple import Mathlib.Util.Superscript /-! # Integral over a torus in `ℂⁿ` In this file we define the integral of a function `f : ℂⁿ → E` over a torus `{z : ℂⁿ \| ∀ i, z i ∈ Metric.sphere (c i) (R i)}`. In order to do this, we define `torusMap (c : ℂⁿ) (R θ : ℝⁿ)` to be the point in `ℂⁿ` given by $z_k=c_k+R_ke^{θ_ki}$, where $i$ is the imaginary unit, then define `torusIntegral f c R` as the integral over the cube $[0, (fun _ ↦ 2π)] = \{θ\\|∀ k, 0 ≤ θ_k ≤ 2π\}$ of the Jacobian of the `torusMap` multiplied by `f (torusMap c R θ)`. We also define a predicate saying that `f ∘ torusMap c R` is integrable on the cube `[0, (fun _ ↦ 2π)]`. ## Main definitions * `torusMap c R`: the generalized multidimensional exponential map from `ℝⁿ` to `ℂⁿ` that sends $θ=(θ_0,…,θ_{n-1})$ to $z=(z_0,…,z_{n-1})$, where $z_k= c_k + R_ke^{θ_k i}$; * `TorusIntegrable f c R`: a function `f : ℂⁿ → E` is integrable over the generalized torus with center `c : ℂⁿ` and radius `R : ℝⁿ` if `f ∘ torusMap c R` is integrable on the closed cube `Icc (0 : ℝⁿ) (fun _ ↦ 2 * π)`; * `torusIntegral f c R`: the integral of a function `f : ℂⁿ → E` over a torus with center `c ∈ ℂⁿ` and radius `R ∈ ℝⁿ` defined as $\iiint_{[0, 2 * π]} (∏_{k = 1}^{n} i R_k e^{θ_k * i}) • f (c + Re^{θ_k i})\,dθ_0…dθ_{k-1}$. ## Main statements * `torusIntegral_dim0`, `torusIntegral_dim1`, `torusIntegral_succ`: formulas for `torusIntegral` in cases of dimension `0`, `1`, and `n + 1`. ## Notations - `ℝ⁰`, `ℝ¹`, `ℝⁿ`, `ℝⁿ⁺¹`: local notation for `Fin 0 → ℝ`, `Fin 1 → ℝ`, `Fin n → ℝ`, and `Fin (n + 1) → ℝ`, respectively; - `ℂ⁰`, `ℂ¹`, `ℂⁿ`, `ℂⁿ⁺¹`: local notation for `Fin 0 → ℂ`, `Fin 1 → ℂ`, `Fin n → ℂ`, and `Fin (n + 1) → ℂ`, respectively; - `∯ z in T(c, R), f z`: notation for `torusIntegral f c R`; - `∮ z in C(c, R), f z`: notation for `circleIntegral f c R`, defined elsewhere; - `∏ k, f k`: notation for `Finset.prod`, defined elsewhere; - `π`: notation for `Real.pi`, defined elsewhere. ## Tags integral, torus -/ variable {n : ℕ} variable {E : Type} [NormedAddCommGroup E] noncomputable section open Complex Set MeasureTheory Function Filter TopologicalSpace open Mathlib.Tactic (superscriptTerm) open scoped Real local syntax:arg term:max noWs superscriptTerm : term local macro_rules \| `($t:term$n:superscript) => `(Fin $n → $t) /-! ### `torusMap`, a parametrization of a torus -/ /-- The n dimensional exponential map $θ_i ↦ c + R e^{θ_iI}, θ ∈ ℝⁿ$ representing a torus in `ℂⁿ` with center `c ∈ ℂⁿ` and generalized radius `R ∈ ℝⁿ`, so we can adjust it to every n axis. -/ def torusMap (c : ℂⁿ) (R : ℝⁿ) : ℝⁿ → ℂⁿ := fun θ i => c i + R i * exp (θ i * I) theorem torusMap_sub_center (c : ℂⁿ) (R : ℝⁿ) (θ : ℝⁿ) : torusMap c R θ - c = torusMap 0 R θ := by ext1 i; simp [torusMap] theorem torusMap_eq_center_iff {c : ℂⁿ} {R : ℝⁿ} {θ : ℝⁿ} : torusMap c R θ = c ↔ R = 0 := by simp [funext_iff, torusMap, exp_ne_zero] @[simp] theorem torusMap_zero_radius (c : ℂⁿ) : torusMap c 0 = const ℝⁿ c := funext fun _ ↦ torusMap_eq_center_iff.2 rfl /-! ### Integrability of a function on a generalized torus -/ /-- A function `f : ℂⁿ → E` is integrable on the generalized torus if the function `f ∘ torusMap c R θ` is integrable on `Icc (0 : ℝⁿ) (fun _ ↦ 2 * π)`. -/ def TorusIntegrable (f : ℂⁿ → E) (c : ℂⁿ) (R : ℝⁿ) : Prop := IntegrableOn (fun θ : ℝⁿ => f (torusMap c R θ)) (Icc (0 : ℝⁿ) fun _ => 2 * π) volume namespace TorusIntegrable variable {f g : ℂⁿ → E} {c : ℂⁿ} {R : ℝⁿ} /-- Constant functions are torus integrable -/ theorem torusIntegrable_const (a : E) (c : ℂⁿ) (R : ℝⁿ) : TorusIntegrable (fun _ => a) c R := by simp [TorusIntegrable, measure_Icc_lt_top] /-- If `f` is torus integrable then `-f` is torus integrable. -/ protected nonrec theorem neg (hf : TorusIntegrable f c R) : TorusIntegrable (-f) c R := hf.neg /-- If `f` and `g` are two torus integrable functions, then so is `f + g`. -/ protected nonrec theorem add (hf : TorusIntegrable f c R) (hg : TorusIntegrable g c R) : TorusIntegrable (f + g) c R := hf.add hg /-- If `f` and `g` are two torus integrable functions, then so is `f - g`. -/ protected nonrec theorem sub (hf : TorusIntegrable f c R) (hg : TorusIntegrable g c R) : TorusIntegrable (f - g) c R := hf.sub hg theorem torusIntegrable_zero_radius {f : ℂⁿ → E} {c : ℂⁿ} : TorusIntegrable f c 0 := by rw [TorusIntegrable, torusMap_zero_radius] apply torusIntegrable_const (f c) c 0 /-- The function given in the definition of `torusIntegral` is integrable. -/ theorem function_integrable [NormedSpace ℂ E] (hf : TorusIntegrable f c R) : IntegrableOn (fun θ : ℝⁿ => (∏ i, R i * exp (θ i * I) * I : ℂ) • f (torusMap c R θ)) (Icc (0 : ℝⁿ) fun _ => 2 * π) volume := by refine (hf.norm.const_mul (∏ i, \|R i\|)).mono' ?_ ?_ · refine (Continuous.aestronglyMeasurable ?_).smul hf.1; fun_prop simp [norm_smul, map_prod] end TorusIntegrable variable [NormedSpace ℂ E] {f g : ℂⁿ → E} {c : ℂⁿ} {R : ℝⁿ} /-- The integral over a generalized torus with center `c ∈ ℂⁿ` and radius `R ∈ ℝⁿ`, defined as the `•`-product of the derivative of `torusMap` and `f (torusMap c R θ)` -/ def torusIntegral (f : ℂⁿ → E) (c : ℂⁿ) (R : ℝⁿ) := ∫ θ : ℝⁿ in Icc (0 : ℝⁿ) fun _ => 2 * π, (∏ i, R i * exp (θ i * I) * I : ℂ) • f (torusMap c R θ) @[inherit_doc torusIntegral] notation3"∯ "(...)" in ""T("c", "R")"", "r:(scoped f => torusIntegral f c R) => r theorem torusIntegral_radius_zero (hn : n ≠ 0) (f : ℂⁿ → E) (c : ℂⁿ) : (∯ x in T(c, 0), f x) = 0 := by simp only [torusIntegral, Pi.zero_apply, ofReal_zero, mul_zero, zero_mul, Fin.prod_const, zero_pow hn, zero_smul, integral_zero] theorem torusIntegral_neg (f : ℂⁿ → E) (c : ℂⁿ) (R : ℝⁿ) : (∯ x in T(c, R), -f x) = -∯ x in T(c, R), f x := by simp [torusIntegral, integral_neg] theorem torusIntegral_add (hf : TorusIntegrable f c R) (hg : TorusIntegrable g c R) : (∯ x in T(c, R), f x + g x) = (∯ x in T(c, R), f x) + ∯ x in T(c, R), g x := by simpa only [torusIntegral, smul_add, Pi.add_apply] using integral_add hf.function_integrable hg.function_integrable theorem torusIntegral_sub (hf : TorusIntegrable f c R) (hg : TorusIntegrable g c R) : (∯ x in T(c, R), f x - g x) = (∯ x in T(c, R), f x) - ∯ x in T(c, R), g x := by simpa only [sub_eq_add_neg, ← torusIntegral_neg] using torusIntegral_add hf hg.neg theorem torusIntegral_smul {𝕜 : Type} [RCLike 𝕜] [NormedSpace 𝕜 E] [SMulCommClass 𝕜 ℂ E] (a : 𝕜) (f : ℂⁿ → E) (c : ℂⁿ) (R : ℝⁿ) : (∯ x in T(c, R), a • f x) = a • ∯ x in T(c, R), f x := by simp only [torusIntegral, integral_smul, ← smul_comm a (_ : ℂ) (_ : E)] theorem torusIntegral_const_mul (a : ℂ) (f : ℂⁿ → ℂ) (c : ℂⁿ) (R : ℝⁿ) : (∯ x in T(c, R), a f x) = a * ∯ x in T(c, R), f x := torusIntegral_smul a f c R /-- If for all `θ : ℝⁿ`, `‖f (torusMap c R θ)‖` is less than or equal to a constant `C : ℝ`, then `‖∯ x in T(c, R), f x‖` is less than or equal to `(2 * π)^n * (∏ i, \|R i\|) * C` -/ theorem norm_torusIntegral_le_of_norm_le_const {C : ℝ} (hf : ∀ θ, ‖f (torusMap c R θ)‖ ≤ C) : ‖∯ x in T(c, R), f x‖ ≤ ((2 * π) ^ (n : ℕ) * ∏ i, \|R i\|) * C := calc ‖∯ x in T(c, R), f x‖ ≤ (∏ i, \|R i\|) * C * (volume (Icc (0 : ℝⁿ) fun _ => 2 * π)).toReal := norm_setIntegral_le_of_norm_le_const measure_Icc_lt_top fun θ _ => calc ‖(∏ i : Fin n, R i * exp (θ i * I) * I : ℂ) • f (torusMap c R θ)‖ = (∏ i : Fin n, \|R i\|) * ‖f (torusMap c R θ)‖ := by simp [norm_smul] _ ≤ (∏ i : Fin n, \|R i\|) * C := mul_le_mul_of_nonneg_left (hf _) <\| by positivity _ = ((2 * π) ^ (n : ℕ) * ∏ i, \|R i\|) * C := by simp only [Pi.zero_def, Real.volume_Icc_pi_toReal fun _ => Real.two_pi_pos.le, sub_zero, Fin.prod_const, mul_assoc, mul_comm ((2 * π) ^ (n : ℕ))] @[simp] theorem torusIntegral_dim0 [CompleteSpace E] (f : ℂ⁰ → E) (c : ℂ⁰) (R : ℝ⁰) : (∯ x in T(c, R), f x) = f c := by simp only [torusIntegral, Fin.prod_univ_zero, one_smul, Subsingleton.elim (fun _ : Fin 0 => 2 * π) 0, Icc_self, Measure.restrict_singleton, volume_pi, integral_smul_measure, integral_dirac, Measure.pi_of_empty (fun _ : Fin 0 ↦ volume) 0, Measure.dirac_apply_of_mem (mem_singleton _), Subsingleton.elim (torusMap c R 0) c]	/-- In dimension one, `torusIntegral` is the same as `circleIntegral` (up to the natural equivalence between `ℂ` and `Fin 1 → ℂ`). -/ theorem torusIntegral_dim1 (f : ℂ¹ → E) (c : ℂ¹) (R : ℝ¹) : (∯ x in T(c, R), f x) = ∮ z in C(c 0, R 0), f fun _ => z := by have H₁ : (((MeasurableEquiv.funUnique _ _).symm) ⁻¹' Icc 0 fun _ => 2 * π) = Icc 0 (2 * π) := (OrderIso.funUnique (Fin 1) ℝ).symm.preimage_Icc _ _ have H₂ : torusMap c R = fun θ _ ↦ circleMap (c 0) (R 0) (θ 0) := by ext θ i : 2 rw [Subsingleton.elim i 0]; rfl rw [torusIntegral, circleIntegral, intervalIntegral.integral_of_le Real.two_pi_pos.le, Measure.restrict_congr_set Ioc_ae_eq_Icc, ← ((volume_preserving_funUnique (Fin 1) ℝ).symm _).setIntegral_preimage_emb	Mathlib/MeasureTheory/Integral/TorusIntegral.lean	193	204
/- Copyright (c) 2024 Violeta Hernández Palacios. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Violeta Hernández Palacios -/ import Mathlib.SetTheory.Cardinal.Arithmetic import Mathlib.SetTheory.Ordinal.Principal /-! # Ordinal arithmetic with cardinals This file collects results about the cardinality of different ordinal operations. -/ universe u v open Cardinal Ordinal Set /-! ### Cardinal operations with ordinal indices -/ namespace Cardinal /-- Bounds the cardinal of an ordinal-indexed union of sets. -/ lemma mk_iUnion_Ordinal_lift_le_of_le {β : Type v} {o : Ordinal.{u}} {c : Cardinal.{v}} (ho : lift.{v} o.card ≤ lift.{u} c) (hc : ℵ₀ ≤ c) (A : Ordinal → Set β) (hA : ∀ j < o, #(A j) ≤ c) : #(⋃ j < o, A j) ≤ c := by simp_rw [← mem_Iio, biUnion_eq_iUnion, iUnion, iSup, ← o.enumIsoToType.symm.surjective.range_comp] rw [← lift_le.{u}] apply ((mk_iUnion_le_lift _).trans _).trans_eq (mul_eq_self (aleph0_le_lift.2 hc)) rw [mk_toType] refine mul_le_mul' ho (ciSup_le' ?_) intro i simpa using hA _ (o.enumIsoToType.symm i).2 lemma mk_iUnion_Ordinal_le_of_le {β : Type} {o : Ordinal} {c : Cardinal} (ho : o.card ≤ c) (hc : ℵ₀ ≤ c) (A : Ordinal → Set β) (hA : ∀ j < o, #(A j) ≤ c) : #(⋃ j < o, A j) ≤ c := by apply mk_iUnion_Ordinal_lift_le_of_le _ hc A hA rwa [Cardinal.lift_le] end Cardinal @[deprecated mk_iUnion_Ordinal_le_of_le (since := "2024-11-02")] alias Ordinal.Cardinal.mk_iUnion_Ordinal_le_of_le := mk_iUnion_Ordinal_le_of_le /-! ### Cardinality of ordinals -/ namespace Ordinal theorem lift_card_iSup_le_sum_card {ι : Type u} [Small.{v} ι] (f : ι → Ordinal.{v}) : Cardinal.lift.{u} (⨆ i, f i).card ≤ Cardinal.sum fun i ↦ (f i).card := by simp_rw [← mk_toType] rw [← mk_sigma, ← Cardinal.lift_id'.{v} #(Σ _, _), ← Cardinal.lift_umax.{v, u}] apply lift_mk_le_lift_mk_of_surjective (f := enumIsoToType _ ∘ (⟨(enumIsoToType _).symm ·.2, (mem_Iio.mp ((enumIsoToType _).symm _).2).trans_le (Ordinal.le_iSup _ _)⟩)) rw [EquivLike.comp_surjective] rintro ⟨x, hx⟩ obtain ⟨i, hi⟩ := Ordinal.lt_iSup_iff.mp hx exact ⟨⟨i, enumIsoToType _ ⟨x, hi⟩⟩, by simp⟩ theorem card_iSup_le_sum_card {ι : Type u} (f : ι → Ordinal.{max u v}) : (⨆ i, f i).card ≤ Cardinal.sum (fun i ↦ (f i).card) := by have := lift_card_iSup_le_sum_card f rwa [Cardinal.lift_id'] at this theorem card_iSup_Iio_le_sum_card {o : Ordinal.{u}} (f : Iio o → Ordinal.{max u v}) : (⨆ a : Iio o, f a).card ≤ Cardinal.sum fun i ↦ (f ((enumIsoToType o).symm i)).card := by apply le_of_eq_of_le (congr_arg _ _).symm (card_iSup_le_sum_card _) simpa using (enumIsoToType o).symm.iSup_comp (g := fun x ↦ f x) theorem card_iSup_Iio_le_card_mul_iSup {o : Ordinal.{u}} (f : Iio o → Ordinal.{max u v}) : (⨆ a : Iio o, f a).card ≤ Cardinal.lift.{v} o.card ⨆ a : Iio o, (f a).card := by apply (card_iSup_Iio_le_sum_card f).trans convert ← sum_le_iSup_lift _ · exact mk_toType o · exact (enumIsoToType o).symm.iSup_comp (g := fun x ↦ (f x).card) theorem card_opow_le_of_omega0_le_left {a : Ordinal} (ha : ω ≤ a) (b : Ordinal) : (a ^ b).card ≤ max a.card b.card := by refine limitRecOn b ?_ ?_ ?_ · simpa using one_lt_omega0.le.trans ha · intro b IH rw [opow_succ, card_mul, card_succ, Cardinal.mul_eq_max_of_aleph0_le_right, max_comm] · apply (max_le_max_left _ IH).trans rw [← max_assoc, max_self] exact max_le_max_left _ le_self_add · rw [ne_eq, card_eq_zero, opow_eq_zero] rintro ⟨rfl, -⟩ cases omega0_pos.not_le ha · rwa [aleph0_le_card] · intro b hb IH rw [(isNormal_opow (one_lt_omega0.trans_le ha)).apply_of_isLimit hb] apply (card_iSup_Iio_le_card_mul_iSup _).trans rw [Cardinal.lift_id, Cardinal.mul_eq_max_of_aleph0_le_right, max_comm] · apply max_le _ (le_max_right _ _) apply ciSup_le' intro c exact (IH c.1 c.2).trans (max_le_max_left _ (card_le_card c.2.le)) · simpa using hb.pos.ne' · refine le_ciSup_of_le ?_ ⟨1, one_lt_omega0.trans_le <\| omega0_le_of_isLimit hb⟩ ?_ · exact Cardinal.bddAbove_of_small _ · simpa theorem card_opow_le_of_omega0_le_right (a : Ordinal) {b : Ordinal} (hb : ω ≤ b) : (a ^ b).card ≤ max a.card b.card := by obtain ⟨n, rfl⟩ \| ha := eq_nat_or_omega0_le a · apply (card_le_card <\| opow_le_opow_left b (nat_lt_omega0 n).le).trans apply (card_opow_le_of_omega0_le_left le_rfl _).trans simp [hb] · exact card_opow_le_of_omega0_le_left ha b theorem card_opow_le (a b : Ordinal) : (a ^ b).card ≤ max ℵ₀ (max a.card b.card) := by obtain ⟨n, rfl⟩ \| ha := eq_nat_or_omega0_le a · obtain ⟨m, rfl⟩ \| hb := eq_nat_or_omega0_le b · rw [← natCast_opow, card_nat] exact le_max_of_le_left (nat_lt_aleph0 _).le · exact (card_opow_le_of_omega0_le_right _ hb).trans (le_max_right _ _) · exact (card_opow_le_of_omega0_le_left ha _).trans (le_max_right _ _) theorem card_opow_eq_of_omega0_le_left {a b : Ordinal} (ha : ω ≤ a) (hb : 0 < b) : (a ^ b).card = max a.card b.card := by apply (card_opow_le_of_omega0_le_left ha b).antisymm (max_le _ _) <;> apply card_le_card · exact left_le_opow a hb · exact right_le_opow b (one_lt_omega0.trans_le ha) theorem card_opow_eq_of_omega0_le_right {a b : Ordinal} (ha : 1 < a) (hb : ω ≤ b) : (a ^ b).card = max a.card b.card := by apply (card_opow_le_of_omega0_le_right a hb).antisymm (max_le _ _) <;> apply card_le_card · exact left_le_opow a (omega0_pos.trans_le hb) · exact right_le_opow b ha theorem card_omega0_opow {a : Ordinal} (h : a ≠ 0) : card (ω ^ a) = max ℵ₀ a.card := by rw [card_opow_eq_of_omega0_le_left le_rfl h.bot_lt, card_omega0] theorem card_opow_omega0 {a : Ordinal} (h : 1 < a) : card (a ^ ω) = max ℵ₀ a.card := by rw [card_opow_eq_of_omega0_le_right h le_rfl, card_omega0, max_comm] theorem principal_opow_omega (o : Ordinal) : Principal (· ^ ·) (ω_ o) := by obtain rfl \| ho := Ordinal.eq_zero_or_pos o · rw [omega_zero] exact principal_opow_omega0 · intro a b ha hb rw [lt_omega_iff_card_lt] at ha hb ⊢ apply (card_opow_le a b).trans_lt (max_lt _ (max_lt ha hb)) rwa [← aleph_zero, aleph_lt_aleph] theorem IsInitial.principal_opow {o : Ordinal} (h : IsInitial o) (ho : ω ≤ o) : Principal (· ^ ·) o := by obtain ⟨a, rfl⟩ := mem_range_omega_iff.2 ⟨ho, h⟩ exact principal_opow_omega a theorem principal_opow_ord {c : Cardinal} (hc : ℵ₀ ≤ c) : Principal (· ^ ·) c.ord := by apply (isInitial_ord c).principal_opow rwa [omega0_le_ord] /-! ### Initial ordinals are principal -/ theorem principal_add_ord {c : Cardinal} (hc : ℵ₀ ≤ c) : Principal (· + ·) c.ord := by intro a b ha hb rw [lt_ord, card_add] at * exact add_lt_of_lt hc ha hb theorem IsInitial.principal_add {o : Ordinal} (h : IsInitial o) (ho : ω ≤ o) : Principal (· + ·) o := by rw [← h.ord_card] apply principal_add_ord rwa [aleph0_le_card] theorem principal_add_omega (o : Ordinal) : Principal (· + ·) (ω_ o) := (isInitial_omega o).principal_add (omega0_le_omega o) theorem principal_mul_ord {c : Cardinal} (hc : ℵ₀ ≤ c) : Principal (· * ·) c.ord := by intro a b ha hb rw [lt_ord, card_mul] at * exact mul_lt_of_lt hc ha hb theorem IsInitial.principal_mul {o : Ordinal} (h : IsInitial o) (ho : ω ≤ o) : Principal (· * ·) o := by rw [← h.ord_card] apply principal_mul_ord rwa [aleph0_le_card] theorem principal_mul_omega (o : Ordinal) : Principal (· * ·) (ω_ o) := (isInitial_omega o).principal_mul (omega0_le_omega o) @[deprecated principal_add_omega (since := "2024-11-08")] theorem _root_.Cardinal.principal_add_aleph (o : Ordinal) : Principal (· + ·) (ℵ_ o).ord := principal_add_ord <\| aleph0_le_aleph o end Ordinal		Mathlib/SetTheory/Cardinal/Ordinal.lean	1,133	1,135
/- 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, Johan Commelin -/ import Mathlib.Algebra.Polynomial.BigOperators import Mathlib.Algebra.Polynomial.RingDivision import Mathlib.Data.Set.Finite.Lemmas import Mathlib.RingTheory.Coprime.Lemmas import Mathlib.RingTheory.Localization.FractionRing import Mathlib.SetTheory.Cardinal.Order /-! # Theory of univariate polynomials We define the multiset of roots of a polynomial, and prove basic results about it. ## Main definitions * `Polynomial.roots p`: The multiset containing all the roots of `p`, including their multiplicities. * `Polynomial.rootSet p E`: The set of distinct roots of `p` in an algebra `E`. ## Main statements * `Polynomial.C_leadingCoeff_mul_prod_multiset_X_sub_C`: If a polynomial has as many roots as its degree, it can be written as the product of its leading coefficient with `∏ (X - a)` where `a` ranges through its roots. -/ assert_not_exists Ideal open Multiset Finset noncomputable section namespace Polynomial universe u v w z variable {R : Type u} {S : Type v} {T : Type w} {a b : R} {n : ℕ} section CommRing variable [CommRing R] [IsDomain R] {p q : R[X]} section Roots /-- `roots p` noncomputably gives a multiset containing all the roots of `p`, including their multiplicities. -/ noncomputable def roots (p : R[X]) : Multiset R := haveI := Classical.decEq R haveI := Classical.dec (p = 0) if h : p = 0 then ∅ else Classical.choose (exists_multiset_roots h) theorem roots_def [DecidableEq R] (p : R[X]) [Decidable (p = 0)] : p.roots = if h : p = 0 then ∅ else Classical.choose (exists_multiset_roots h) := by rename_i iR ip0 obtain rfl := Subsingleton.elim iR (Classical.decEq R) obtain rfl := Subsingleton.elim ip0 (Classical.dec (p = 0)) rfl @[simp] theorem roots_zero : (0 : R[X]).roots = 0 := dif_pos rfl theorem card_roots (hp0 : p ≠ 0) : (Multiset.card (roots p) : WithBot ℕ) ≤ degree p := by classical unfold roots rw [dif_neg hp0] exact (Classical.choose_spec (exists_multiset_roots hp0)).1 theorem card_roots' (p : R[X]) : Multiset.card p.roots ≤ natDegree p := by by_cases hp0 : p = 0 · simp [hp0] exact WithBot.coe_le_coe.1 (le_trans (card_roots hp0) (le_of_eq <\| degree_eq_natDegree hp0)) theorem card_roots_sub_C {p : R[X]} {a : R} (hp0 : 0 < degree p) : (Multiset.card (p - C a).roots : WithBot ℕ) ≤ degree p := calc (Multiset.card (p - C a).roots : WithBot ℕ) ≤ degree (p - C a) := card_roots <\| mt sub_eq_zero.1 fun h => not_le_of_gt hp0 <\| h.symm ▸ degree_C_le _ = degree p := by rw [sub_eq_add_neg, ← C_neg]; exact degree_add_C hp0 theorem card_roots_sub_C' {p : R[X]} {a : R} (hp0 : 0 < degree p) : Multiset.card (p - C a).roots ≤ natDegree p := WithBot.coe_le_coe.1 (le_trans (card_roots_sub_C hp0) (le_of_eq <\| degree_eq_natDegree fun h => by simp_all [lt_irrefl])) @[simp] theorem count_roots [DecidableEq R] (p : R[X]) : p.roots.count a = rootMultiplicity a p := by classical by_cases hp : p = 0 · simp [hp] rw [roots_def, dif_neg hp] exact (Classical.choose_spec (exists_multiset_roots hp)).2 a @[simp] theorem mem_roots' : a ∈ p.roots ↔ p ≠ 0 ∧ IsRoot p a := by classical rw [← count_pos, count_roots p, rootMultiplicity_pos'] theorem mem_roots (hp : p ≠ 0) : a ∈ p.roots ↔ IsRoot p a := mem_roots'.trans <\| and_iff_right hp theorem ne_zero_of_mem_roots (h : a ∈ p.roots) : p ≠ 0 := (mem_roots'.1 h).1 theorem isRoot_of_mem_roots (h : a ∈ p.roots) : IsRoot p a := (mem_roots'.1 h).2 theorem mem_roots_map_of_injective [Semiring S] {p : S[X]} {f : S →+* R} (hf : Function.Injective f) {x : R} (hp : p ≠ 0) : x ∈ (p.map f).roots ↔ p.eval₂ f x = 0 := by rw [mem_roots ((Polynomial.map_ne_zero_iff hf).mpr hp), IsRoot, eval_map] lemma mem_roots_iff_aeval_eq_zero {x : R} (w : p ≠ 0) : x ∈ roots p ↔ aeval x p = 0 := by rw [aeval_def, ← mem_roots_map_of_injective (FaithfulSMul.algebraMap_injective _ _) w, Algebra.id.map_eq_id, map_id] theorem card_le_degree_of_subset_roots {p : R[X]} {Z : Finset R} (h : Z.val ⊆ p.roots) : #Z ≤ p.natDegree := (Multiset.card_le_card (Finset.val_le_iff_val_subset.2 h)).trans (Polynomial.card_roots' p) theorem finite_setOf_isRoot {p : R[X]} (hp : p ≠ 0) : Set.Finite { x \| IsRoot p x } := by classical simpa only [← Finset.setOf_mem, Multiset.mem_toFinset, mem_roots hp] using p.roots.toFinset.finite_toSet theorem eq_zero_of_infinite_isRoot (p : R[X]) (h : Set.Infinite { x \| IsRoot p x }) : p = 0 := not_imp_comm.mp finite_setOf_isRoot h theorem exists_max_root [LinearOrder R] (p : R[X]) (hp : p ≠ 0) : ∃ x₀, ∀ x, p.IsRoot x → x ≤ x₀ := Set.exists_upper_bound_image _ _ <\| finite_setOf_isRoot hp theorem exists_min_root [LinearOrder R] (p : R[X]) (hp : p ≠ 0) : ∃ x₀, ∀ x, p.IsRoot x → x₀ ≤ x := Set.exists_lower_bound_image _ _ <\| finite_setOf_isRoot hp theorem eq_of_infinite_eval_eq (p q : R[X]) (h : Set.Infinite { x \| eval x p = eval x q }) : p = q := by rw [← sub_eq_zero] apply eq_zero_of_infinite_isRoot simpa only [IsRoot, eval_sub, sub_eq_zero] theorem roots_mul {p q : R[X]} (hpq : p * q ≠ 0) : (p * q).roots = p.roots + q.roots := by classical exact Multiset.ext.mpr fun r => by rw [count_add, count_roots, count_roots, count_roots, rootMultiplicity_mul hpq] theorem roots.le_of_dvd (h : q ≠ 0) : p ∣ q → roots p ≤ roots q := by rintro ⟨k, rfl⟩ exact Multiset.le_iff_exists_add.mpr ⟨k.roots, roots_mul h⟩ theorem mem_roots_sub_C' {p : R[X]} {a x : R} : x ∈ (p - C a).roots ↔ p ≠ C a ∧ p.eval x = a := by rw [mem_roots', IsRoot.def, sub_ne_zero, eval_sub, sub_eq_zero, eval_C] theorem mem_roots_sub_C {p : R[X]} {a x : R} (hp0 : 0 < degree p) : x ∈ (p - C a).roots ↔ p.eval x = a := mem_roots_sub_C'.trans <\| and_iff_right fun hp => hp0.not_le <\| hp.symm ▸ degree_C_le @[simp] theorem roots_X_sub_C (r : R) : roots (X - C r) = {r} := by classical ext s rw [count_roots, rootMultiplicity_X_sub_C, count_singleton] @[simp] theorem roots_X_add_C (r : R) : roots (X + C r) = {-r} := by simpa using roots_X_sub_C (-r) @[simp] theorem roots_X : roots (X : R[X]) = {0} := by rw [← roots_X_sub_C, C_0, sub_zero] @[simp] theorem roots_C (x : R) : (C x).roots = 0 := by classical exact if H : x = 0 then by rw [H, C_0, roots_zero] else Multiset.ext.mpr fun r => (by rw [count_roots, count_zero, rootMultiplicity_eq_zero (not_isRoot_C _ _ H)]) @[simp] theorem roots_one : (1 : R[X]).roots = ∅ := roots_C 1 @[simp] theorem roots_C_mul (p : R[X]) (ha : a ≠ 0) : (C a * p).roots = p.roots := by by_cases hp : p = 0 <;> simp only [roots_mul, , Ne, mul_eq_zero, C_eq_zero, or_self_iff, not_false_iff, roots_C, zero_add, mul_zero] @[simp] theorem roots_smul_nonzero (p : R[X]) (ha : a ≠ 0) : (a • p).roots = p.roots := by rw [smul_eq_C_mul, roots_C_mul _ ha] @[simp] lemma roots_neg (p : R[X]) : (-p).roots = p.roots := by rw [← neg_one_smul R p, roots_smul_nonzero p (neg_ne_zero.mpr one_ne_zero)] @[simp] theorem roots_C_mul_X_sub_C_of_IsUnit (b : R) (a : Rˣ) : (C (a : R) X - C b).roots = {a⁻¹ * b} := by rw [← roots_C_mul _ (Units.ne_zero a⁻¹), mul_sub, ← mul_assoc, ← C_mul, ← C_mul, Units.inv_mul, C_1, one_mul] exact roots_X_sub_C (a⁻¹ * b) @[simp] theorem roots_C_mul_X_add_C_of_IsUnit (b : R) (a : Rˣ) : (C (a : R) * X + C b).roots = {-(a⁻¹ * b)} := by rw [← sub_neg_eq_add, ← C_neg, roots_C_mul_X_sub_C_of_IsUnit, mul_neg] theorem roots_list_prod (L : List R[X]) : (0 : R[X]) ∉ L → L.prod.roots = (L : Multiset R[X]).bind roots := List.recOn L (fun _ => roots_one) fun hd tl ih H => by rw [List.mem_cons, not_or] at H rw [List.prod_cons, roots_mul (mul_ne_zero (Ne.symm H.1) <\| List.prod_ne_zero H.2), ← Multiset.cons_coe, Multiset.cons_bind, ih H.2] theorem roots_multiset_prod (m : Multiset R[X]) : (0 : R[X]) ∉ m → m.prod.roots = m.bind roots := by rcases m with ⟨L⟩ simpa only [Multiset.prod_coe, quot_mk_to_coe''] using roots_list_prod L theorem roots_prod {ι : Type} (f : ι → R[X]) (s : Finset ι) : s.prod f ≠ 0 → (s.prod f).roots = s.val.bind fun i => roots (f i) := by rcases s with ⟨m, hm⟩ simpa [Multiset.prod_eq_zero_iff, Multiset.bind_map] using roots_multiset_prod (m.map f) @[simp] theorem roots_pow (p : R[X]) (n : ℕ) : (p ^ n).roots = n • p.roots := by induction n with \| zero => rw [pow_zero, roots_one, zero_smul, empty_eq_zero] \| succ n ihn => rcases eq_or_ne p 0 with (rfl \| hp) · rw [zero_pow n.succ_ne_zero, roots_zero, smul_zero] · rw [pow_succ, roots_mul (mul_ne_zero (pow_ne_zero _ hp) hp), ihn, add_smul, one_smul] theorem roots_X_pow (n : ℕ) : (X ^ n : R[X]).roots = n • ({0} : Multiset R) := by rw [roots_pow, roots_X] theorem roots_C_mul_X_pow (ha : a ≠ 0) (n : ℕ) : Polynomial.roots (C a X ^ n) = n • ({0} : Multiset R) := by rw [roots_C_mul _ ha, roots_X_pow] @[simp] theorem roots_monomial (ha : a ≠ 0) (n : ℕ) : (monomial n a).roots = n • ({0} : Multiset R) := by rw [← C_mul_X_pow_eq_monomial, roots_C_mul_X_pow ha] theorem roots_prod_X_sub_C (s : Finset R) : (s.prod fun a => X - C a).roots = s.val := by apply (roots_prod (fun a => X - C a) s ?_).trans · simp_rw [roots_X_sub_C] rw [Multiset.bind_singleton, Multiset.map_id'] · refine prod_ne_zero_iff.mpr (fun a _ => X_sub_C_ne_zero a) @[simp] theorem roots_multiset_prod_X_sub_C (s : Multiset R) : (s.map fun a => X - C a).prod.roots = s := by rw [roots_multiset_prod, Multiset.bind_map] · simp_rw [roots_X_sub_C] rw [Multiset.bind_singleton, Multiset.map_id'] · rw [Multiset.mem_map] rintro ⟨a, -, h⟩ exact X_sub_C_ne_zero a h theorem card_roots_X_pow_sub_C {n : ℕ} (hn : 0 < n) (a : R) : Multiset.card (roots ((X : R[X]) ^ n - C a)) ≤ n := WithBot.coe_le_coe.1 <\| calc (Multiset.card (roots ((X : R[X]) ^ n - C a)) : WithBot ℕ) ≤ degree ((X : R[X]) ^ n - C a) := card_roots (X_pow_sub_C_ne_zero hn a) _ = n := degree_X_pow_sub_C hn a section NthRoots /-- `nthRoots n a` noncomputably returns the solutions to `x ^ n = a`. -/ def nthRoots (n : ℕ) (a : R) : Multiset R := roots ((X : R[X]) ^ n - C a) @[simp] theorem mem_nthRoots {n : ℕ} (hn : 0 < n) {a x : R} : x ∈ nthRoots n a ↔ x ^ n = a := by rw [nthRoots, mem_roots (X_pow_sub_C_ne_zero hn a), IsRoot.def, eval_sub, eval_C, eval_pow, eval_X, sub_eq_zero] @[simp] theorem nthRoots_zero (r : R) : nthRoots 0 r = 0 := by simp only [empty_eq_zero, pow_zero, nthRoots, ← C_1, ← C_sub, roots_C] @[simp] theorem nthRoots_zero_right {R} [CommRing R] [IsDomain R] (n : ℕ) : nthRoots n (0 : R) = Multiset.replicate n 0 := by rw [nthRoots, C.map_zero, sub_zero, roots_pow, roots_X, Multiset.nsmul_singleton] theorem card_nthRoots (n : ℕ) (a : R) : Multiset.card (nthRoots n a) ≤ n := by classical exact (if hn : n = 0 then if h : (X : R[X]) ^ n - C a = 0 then by simp [Nat.zero_le, nthRoots, roots, h, dif_pos rfl, empty_eq_zero, Multiset.card_zero] else WithBot.coe_le_coe.1 (le_trans (card_roots h) (by rw [hn, pow_zero, ← C_1, ← RingHom.map_sub] exact degree_C_le)) else by rw [← Nat.cast_le (α := WithBot ℕ)] rw [← degree_X_pow_sub_C (Nat.pos_of_ne_zero hn) a] exact card_roots (X_pow_sub_C_ne_zero (Nat.pos_of_ne_zero hn) a)) @[simp] theorem nthRoots_two_eq_zero_iff {r : R} : nthRoots 2 r = 0 ↔ ¬IsSquare r := by simp_rw [isSquare_iff_exists_sq, eq_zero_iff_forall_not_mem, mem_nthRoots (by norm_num : 0 < 2), ← not_exists, eq_comm] /-- The multiset `nthRoots ↑n a` as a Finset. Previously `nthRootsFinset n` was defined to be `nthRoots n (1 : R)` as a Finset. That situation can be recovered by setting `a` to be `(1 : R)` -/ def nthRootsFinset (n : ℕ) {R : Type} (a : R) [CommRing R] [IsDomain R] : Finset R := haveI := Classical.decEq R Multiset.toFinset (nthRoots n a) lemma nthRootsFinset_def (n : ℕ) {R : Type} (a : R) [CommRing R] [IsDomain R] [DecidableEq R] : nthRootsFinset n a = Multiset.toFinset (nthRoots n a) := by unfold nthRootsFinset convert rfl @[simp] theorem mem_nthRootsFinset {n : ℕ} (h : 0 < n) (a : R) {x : R} : x ∈ nthRootsFinset n a ↔ x ^ (n : ℕ) = a := by classical rw [nthRootsFinset_def, mem_toFinset, mem_nthRoots h] @[simp] theorem nthRootsFinset_zero (a : R) : nthRootsFinset 0 a = ∅ := by classical simp [nthRootsFinset_def] theorem map_mem_nthRootsFinset {S F : Type} [CommRing S] [IsDomain S] [FunLike F R S] [MonoidHomClass F R S] {a : R} {x : R} (hx : x ∈ nthRootsFinset n a) (f : F) : f x ∈ nthRootsFinset n (f a) := by by_cases hn : n = 0 · simp [hn] at hx · rw [mem_nthRootsFinset <\| Nat.pos_of_ne_zero hn, ← map_pow, (mem_nthRootsFinset (Nat.pos_of_ne_zero hn) a).1 hx] theorem map_mem_nthRootsFinset_one {S F : Type} [CommRing S] [IsDomain S] [FunLike F R S] [RingHomClass F R S] {x : R} (hx : x ∈ nthRootsFinset n 1) (f : F) : f x ∈ nthRootsFinset n 1 := by rw [← (map_one f)] exact map_mem_nthRootsFinset hx _ theorem mul_mem_nthRootsFinset {η₁ η₂ : R} {a₁ a₂ : R} (hη₁ : η₁ ∈ nthRootsFinset n a₁) (hη₂ : η₂ ∈ nthRootsFinset n a₂) : η₁ * η₂ ∈ nthRootsFinset n (a₁ * a₂) := by cases n with \| zero => simp only [nthRootsFinset_zero, not_mem_empty] at hη₁ \| succ n => rw [mem_nthRootsFinset n.succ_pos] at hη₁ hη₂ ⊢ rw [mul_pow, hη₁, hη₂] theorem ne_zero_of_mem_nthRootsFinset {η : R} {a : R} (ha : a ≠ 0) (hη : η ∈ nthRootsFinset n a) : η ≠ 0 := by nontriviality R rintro rfl cases n with \| zero => simp only [nthRootsFinset_zero, not_mem_empty] at hη \| succ n => rw [mem_nthRootsFinset n.succ_pos, zero_pow n.succ_ne_zero] at hη exact ha hη.symm theorem one_mem_nthRootsFinset (hn : 0 < n) : 1 ∈ nthRootsFinset n (1 : R) := by rw [mem_nthRootsFinset hn, one_pow] end NthRoots theorem zero_of_eval_zero [Infinite R] (p : R[X]) (h : ∀ x, p.eval x = 0) : p = 0 := by classical by_contra hp refine @Fintype.false R _ ?_ exact ⟨p.roots.toFinset, fun x => Multiset.mem_toFinset.mpr ((mem_roots hp).mpr (h _))⟩	theorem funext [Infinite R] {p q : R[X]} (ext : ∀ r : R, p.eval r = q.eval r) : p = q := by rw [← sub_eq_zero] apply zero_of_eval_zero intro x rw [eval_sub, sub_eq_zero, ext] variable [CommRing T] /-- Given a polynomial `p` with coefficients in a ring `T` and a `T`-algebra `S`, `aroots p S` is	Mathlib/Algebra/Polynomial/Roots.lean	379	387
/- Copyright (c) 2017 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Data.Ordmap.Invariants /-! # Verification of `Ordnode` This file uses the invariants defined in `Mathlib.Data.Ordmap.Invariants` to construct `Ordset α`, a wrapper around `Ordnode α` which includes the correctness invariant of the type. It exposes parallel operations like `insert` as functions on `Ordset` that do the same thing but bundle the correctness proofs. The advantage is that it is possible to, for example, prove that the result of `find` on `insert` will actually find the element, while `Ordnode` cannot guarantee this if the input tree did not satisfy the type invariants. ## Main definitions * `Ordnode.Valid`: The validity predicate for an `Ordnode` subtree. * `Ordset α`: A well formed set of values of type `α`. ## Implementation notes Because the `Ordnode` file was ported from Haskell, the correctness invariants of some of the functions have not been spelled out, and some theorems like `Ordnode.Valid'.balanceL_aux` show very intricate assumptions on the sizes, which may need to be revised if it turns out some operations violate these assumptions, because there is a decent amount of slop in the actual data structure invariants, so the theorem will go through with multiple choices of assumption. -/ variable {α : Type} namespace Ordnode section Valid variable [Preorder α] /-- The validity predicate for an `Ordnode` subtree. This asserts that the `size` fields are correct, the tree is balanced, and the elements of the tree are organized according to the ordering. This version of `Valid` also puts all elements in the tree in the interval `(lo, hi)`. -/ structure Valid' (lo : WithBot α) (t : Ordnode α) (hi : WithTop α) : Prop where ord : t.Bounded lo hi sz : t.Sized bal : t.Balanced /-- The validity predicate for an `Ordnode` subtree. This asserts that the `size` fields are correct, the tree is balanced, and the elements of the tree are organized according to the ordering. -/ def Valid (t : Ordnode α) : Prop := Valid' ⊥ t ⊤ theorem Valid'.mono_left {x y : α} (xy : x ≤ y) {t : Ordnode α} {o} (h : Valid' y t o) : Valid' x t o := ⟨h.1.mono_left xy, h.2, h.3⟩ theorem Valid'.mono_right {x y : α} (xy : x ≤ y) {t : Ordnode α} {o} (h : Valid' o t x) : Valid' o t y := ⟨h.1.mono_right xy, h.2, h.3⟩ theorem Valid'.trans_left {t₁ t₂ : Ordnode α} {x : α} {o₁ o₂} (h : Bounded t₁ o₁ x) (H : Valid' x t₂ o₂) : Valid' o₁ t₂ o₂ := ⟨h.trans_left H.1, H.2, H.3⟩ theorem Valid'.trans_right {t₁ t₂ : Ordnode α} {x : α} {o₁ o₂} (H : Valid' o₁ t₁ x) (h : Bounded t₂ x o₂) : Valid' o₁ t₁ o₂ := ⟨H.1.trans_right h, H.2, H.3⟩ theorem Valid'.of_lt {t : Ordnode α} {x : α} {o₁ o₂} (H : Valid' o₁ t o₂) (h₁ : Bounded nil o₁ x) (h₂ : All (· < x) t) : Valid' o₁ t x := ⟨H.1.of_lt h₁ h₂, H.2, H.3⟩ theorem Valid'.of_gt {t : Ordnode α} {x : α} {o₁ o₂} (H : Valid' o₁ t o₂) (h₁ : Bounded nil x o₂) (h₂ : All (· > x) t) : Valid' x t o₂ := ⟨H.1.of_gt h₁ h₂, H.2, H.3⟩ theorem Valid'.valid {t o₁ o₂} (h : @Valid' α _ o₁ t o₂) : Valid t := ⟨h.1.weak, h.2, h.3⟩ theorem valid'_nil {o₁ o₂} (h : Bounded nil o₁ o₂) : Valid' o₁ (@nil α) o₂ := ⟨h, ⟨⟩, ⟨⟩⟩ theorem valid_nil : Valid (@nil α) := valid'_nil ⟨⟩ theorem Valid'.node {s l} {x : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hr : Valid' x r o₂) (H : BalancedSz (size l) (size r)) (hs : s = size l + size r + 1) : Valid' o₁ (@node α s l x r) o₂ := ⟨⟨hl.1, hr.1⟩, ⟨hs, hl.2, hr.2⟩, ⟨H, hl.3, hr.3⟩⟩ theorem Valid'.dual : ∀ {t : Ordnode α} {o₁ o₂}, Valid' o₁ t o₂ → @Valid' αᵒᵈ _ o₂ (dual t) o₁ \| .nil, _, _, h => valid'_nil h.1.dual \| .node _ l _ r, _, _, ⟨⟨ol, Or⟩, ⟨rfl, sl, sr⟩, ⟨b, bl, br⟩⟩ => let ⟨ol', sl', bl'⟩ := Valid'.dual ⟨ol, sl, bl⟩ let ⟨or', sr', br'⟩ := Valid'.dual ⟨Or, sr, br⟩ ⟨⟨or', ol'⟩, ⟨by simp [size_dual, add_comm], sr', sl'⟩, ⟨by rw [size_dual, size_dual]; exact b.symm, br', bl'⟩⟩ theorem Valid'.dual_iff {t : Ordnode α} {o₁ o₂} : Valid' o₁ t o₂ ↔ @Valid' αᵒᵈ _ o₂ (.dual t) o₁ := ⟨Valid'.dual, fun h => by have := Valid'.dual h; rwa [dual_dual, OrderDual.Preorder.dual_dual] at this⟩ theorem Valid.dual {t : Ordnode α} : Valid t → @Valid αᵒᵈ _ (.dual t) := Valid'.dual theorem Valid.dual_iff {t : Ordnode α} : Valid t ↔ @Valid αᵒᵈ _ (.dual t) := Valid'.dual_iff theorem Valid'.left {s l x r o₁ o₂} (H : Valid' o₁ (@Ordnode.node α s l x r) o₂) : Valid' o₁ l x := ⟨H.1.1, H.2.2.1, H.3.2.1⟩ theorem Valid'.right {s l x r o₁ o₂} (H : Valid' o₁ (@Ordnode.node α s l x r) o₂) : Valid' x r o₂ := ⟨H.1.2, H.2.2.2, H.3.2.2⟩ nonrec theorem Valid.left {s l x r} (H : Valid (@node α s l x r)) : Valid l := H.left.valid nonrec theorem Valid.right {s l x r} (H : Valid (@node α s l x r)) : Valid r := H.right.valid theorem Valid.size_eq {s l x r} (H : Valid (@node α s l x r)) : size (@node α s l x r) = size l + size r + 1 := H.2.1 theorem Valid'.node' {l} {x : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hr : Valid' x r o₂) (H : BalancedSz (size l) (size r)) : Valid' o₁ (@node' α l x r) o₂ := hl.node hr H rfl theorem valid'_singleton {x : α} {o₁ o₂} (h₁ : Bounded nil o₁ x) (h₂ : Bounded nil x o₂) : Valid' o₁ (singleton x : Ordnode α) o₂ := (valid'_nil h₁).node (valid'_nil h₂) (Or.inl zero_le_one) rfl theorem valid_singleton {x : α} : Valid (singleton x : Ordnode α) := valid'_singleton ⟨⟩ ⟨⟩ theorem Valid'.node3L {l} {x : α} {m} {y : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hm : Valid' x m y) (hr : Valid' y r o₂) (H1 : BalancedSz (size l) (size m)) (H2 : BalancedSz (size l + size m + 1) (size r)) : Valid' o₁ (@node3L α l x m y r) o₂ := (hl.node' hm H1).node' hr H2 theorem Valid'.node3R {l} {x : α} {m} {y : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hm : Valid' x m y) (hr : Valid' y r o₂) (H1 : BalancedSz (size l) (size m + size r + 1)) (H2 : BalancedSz (size m) (size r)) : Valid' o₁ (@node3R α l x m y r) o₂ := hl.node' (hm.node' hr H2) H1 theorem Valid'.node4L_lemma₁ {a b c d : ℕ} (lr₂ : 3 (b + c + 1 + d) ≤ 16 * a + 9) (mr₂ : b + c + 1 ≤ 3 * d) (mm₁ : b ≤ 3 * c) : b < 3 * a + 1 := by omega theorem Valid'.node4L_lemma₂ {b c d : ℕ} (mr₂ : b + c + 1 ≤ 3 * d) : c ≤ 3 * d := by omega theorem Valid'.node4L_lemma₃ {b c d : ℕ} (mr₁ : 2 * d ≤ b + c + 1) (mm₁ : b ≤ 3 * c) : d ≤ 3 * c := by omega theorem Valid'.node4L_lemma₄ {a b c d : ℕ} (lr₁ : 3 * a ≤ b + c + 1 + d) (mr₂ : b + c + 1 ≤ 3 * d) (mm₁ : b ≤ 3 * c) : a + b + 1 ≤ 3 * (c + d + 1) := by omega theorem Valid'.node4L_lemma₅ {a b c d : ℕ} (lr₂ : 3 * (b + c + 1 + d) ≤ 16 * a + 9) (mr₁ : 2 * d ≤ b + c + 1) (mm₂ : c ≤ 3 * b) : c + d + 1 ≤ 3 * (a + b + 1) := by omega theorem Valid'.node4L {l} {x : α} {m} {y : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hm : Valid' x m y) (hr : Valid' (↑y) r o₂) (Hm : 0 < size m) (H : size l = 0 ∧ size m = 1 ∧ size r ≤ 1 ∨ 0 < size l ∧ ratio * size r ≤ size m ∧ delta * size l ≤ size m + size r ∧ 3 * (size m + size r) ≤ 16 * size l + 9 ∧ size m ≤ delta * size r) : Valid' o₁ (@node4L α l x m y r) o₂ := by obtain - \| ⟨s, ml, z, mr⟩ := m; · cases Hm suffices BalancedSz (size l) (size ml) ∧ BalancedSz (size mr) (size r) ∧ BalancedSz (size l + size ml + 1) (size mr + size r + 1) from Valid'.node' (hl.node' hm.left this.1) (hm.right.node' hr this.2.1) this.2.2 rcases H with (⟨l0, m1, r0⟩ \| ⟨l0, mr₁, lr₁, lr₂, mr₂⟩) · rw [hm.2.size_eq, Nat.succ_inj, add_eq_zero] at m1 rw [l0, m1.1, m1.2]; revert r0; rcases size r with (_ \| _ \| _) <;> [decide; decide; (intro r0; unfold BalancedSz delta; omega)] · rcases Nat.eq_zero_or_pos (size r) with r0 \| r0 · rw [r0] at mr₂; cases not_le_of_lt Hm mr₂ rw [hm.2.size_eq] at lr₁ lr₂ mr₁ mr₂ by_cases mm : size ml + size mr ≤ 1 · have r1 := le_antisymm ((mul_le_mul_left (by decide)).1 (le_trans mr₁ (Nat.succ_le_succ mm) : _ ≤ ratio * 1)) r0 rw [r1, add_assoc] at lr₁ have l1 := le_antisymm ((mul_le_mul_left (by decide)).1 (le_trans lr₁ (add_le_add_right mm 2) : _ ≤ delta * 1)) l0 rw [l1, r1] revert mm; cases size ml <;> cases size mr <;> intro mm · decide · rw [zero_add] at mm; rcases mm with (_ \| ⟨⟨⟩⟩) decide · rcases mm with (_ \| ⟨⟨⟩⟩); decide · rw [Nat.succ_add] at mm; rcases mm with (_ \| ⟨⟨⟩⟩) rcases hm.3.1.resolve_left mm with ⟨mm₁, mm₂⟩ rcases Nat.eq_zero_or_pos (size ml) with ml0 \| ml0 · rw [ml0, mul_zero, Nat.le_zero] at mm₂ rw [ml0, mm₂] at mm; cases mm (by decide) have : 2 * size l ≤ size ml + size mr + 1 := by have := Nat.mul_le_mul_left ratio lr₁ rw [mul_left_comm, mul_add] at this have := le_trans this (add_le_add_left mr₁ _) rw [← Nat.succ_mul] at this exact (mul_le_mul_left (by decide)).1 this refine ⟨Or.inr ⟨?_, ?_⟩, Or.inr ⟨?_, ?_⟩, Or.inr ⟨?_, ?_⟩⟩ · refine (mul_le_mul_left (by decide)).1 (le_trans this ?_) rw [two_mul, Nat.succ_le_iff] refine add_lt_add_of_lt_of_le ?_ mm₂ simpa using (mul_lt_mul_right ml0).2 (by decide : 1 < 3) · exact Nat.le_of_lt_succ (Valid'.node4L_lemma₁ lr₂ mr₂ mm₁) · exact Valid'.node4L_lemma₂ mr₂ · exact Valid'.node4L_lemma₃ mr₁ mm₁ · exact Valid'.node4L_lemma₄ lr₁ mr₂ mm₁ · exact Valid'.node4L_lemma₅ lr₂ mr₁ mm₂ theorem Valid'.rotateL_lemma₁ {a b c : ℕ} (H2 : 3 * a ≤ b + c) (hb₂ : c ≤ 3 * b) : a ≤ 3 * b := by omega theorem Valid'.rotateL_lemma₂ {a b c : ℕ} (H3 : 2 * (b + c) ≤ 9 * a + 3) (h : b < 2 * c) : b < 3 * a + 1 := by omega theorem Valid'.rotateL_lemma₃ {a b c : ℕ} (H2 : 3 * a ≤ b + c) (h : b < 2 * c) : a + b < 3 * c := by omega theorem Valid'.rotateL_lemma₄ {a b : ℕ} (H3 : 2 * b ≤ 9 * a + 3) : 3 * b ≤ 16 * a + 9 := by omega theorem Valid'.rotateL {l} {x : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hr : Valid' x r o₂) (H1 : ¬size l + size r ≤ 1) (H2 : delta * size l < size r) (H3 : 2 * size r ≤ 9 * size l + 5 ∨ size r ≤ 3) : Valid' o₁ (@rotateL α l x r) o₂ := by obtain - \| ⟨rs, rl, rx, rr⟩ := r; · cases H2 rw [hr.2.size_eq, Nat.lt_succ_iff] at H2 rw [hr.2.size_eq] at H3 replace H3 : 2 * (size rl + size rr) ≤ 9 * size l + 3 ∨ size rl + size rr ≤ 2 := H3.imp (@Nat.le_of_add_le_add_right _ 2 _) Nat.le_of_succ_le_succ have H3_0 : size l = 0 → size rl + size rr ≤ 2 := by intro l0; rw [l0] at H3 exact (or_iff_right_of_imp fun h => (mul_le_mul_left (by decide)).1 (le_trans h (by decide))).1 H3 have H3p : size l > 0 → 2 * (size rl + size rr) ≤ 9 * size l + 3 := fun l0 : 1 ≤ size l => (or_iff_left_of_imp <\| by omega).1 H3 have ablem : ∀ {a b : ℕ}, 1 ≤ a → a + b ≤ 2 → b ≤ 1 := by omega have hlp : size l > 0 → ¬size rl + size rr ≤ 1 := fun l0 hb => absurd (le_trans (le_trans (Nat.mul_le_mul_left _ l0) H2) hb) (by decide) rw [Ordnode.rotateL_node]; split_ifs with h · have rr0 : size rr > 0 := (mul_lt_mul_left (by decide)).1 (lt_of_le_of_lt (Nat.zero_le _) h : ratio * 0 < _) suffices BalancedSz (size l) (size rl) ∧ BalancedSz (size l + size rl + 1) (size rr) by exact hl.node3L hr.left hr.right this.1 this.2 rcases Nat.eq_zero_or_pos (size l) with l0 \| l0 · rw [l0]; replace H3 := H3_0 l0 have := hr.3.1 rcases Nat.eq_zero_or_pos (size rl) with rl0 \| rl0 · rw [rl0] at this ⊢ rw [le_antisymm (balancedSz_zero.1 this.symm) rr0] decide have rr1 : size rr = 1 := le_antisymm (ablem rl0 H3) rr0 rw [add_comm] at H3 rw [rr1, show size rl = 1 from le_antisymm (ablem rr0 H3) rl0] decide replace H3 := H3p l0 rcases hr.3.1.resolve_left (hlp l0) with ⟨_, hb₂⟩ refine ⟨Or.inr ⟨?_, ?_⟩, Or.inr ⟨?_, ?_⟩⟩ · exact Valid'.rotateL_lemma₁ H2 hb₂ · exact Nat.le_of_lt_succ (Valid'.rotateL_lemma₂ H3 h) · exact Valid'.rotateL_lemma₃ H2 h · exact le_trans hb₂ (Nat.mul_le_mul_left _ <\| le_trans (Nat.le_add_left _ _) (Nat.le_add_right _ _)) · rcases Nat.eq_zero_or_pos (size rl) with rl0 \| rl0 · rw [rl0, not_lt, Nat.le_zero, Nat.mul_eq_zero] at h replace h := h.resolve_left (by decide) rw [rl0, h, Nat.le_zero, Nat.mul_eq_zero] at H2 rw [hr.2.size_eq, rl0, h, H2.resolve_left (by decide)] at H1 cases H1 (by decide) refine hl.node4L hr.left hr.right rl0 ?_ rcases Nat.eq_zero_or_pos (size l) with l0 \| l0 · replace H3 := H3_0 l0 rcases Nat.eq_zero_or_pos (size rr) with rr0 \| rr0 · have := hr.3.1 rw [rr0] at this exact Or.inl ⟨l0, le_antisymm (balancedSz_zero.1 this) rl0, rr0.symm ▸ zero_le_one⟩ exact Or.inl ⟨l0, le_antisymm (ablem rr0 <\| by rwa [add_comm]) rl0, ablem rl0 H3⟩ exact Or.inr ⟨l0, not_lt.1 h, H2, Valid'.rotateL_lemma₄ (H3p l0), (hr.3.1.resolve_left (hlp l0)).1⟩ theorem Valid'.rotateR {l} {x : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hr : Valid' x r o₂) (H1 : ¬size l + size r ≤ 1) (H2 : delta * size r < size l) (H3 : 2 * size l ≤ 9 * size r + 5 ∨ size l ≤ 3) : Valid' o₁ (@rotateR α l x r) o₂ := by refine Valid'.dual_iff.2 ?_ rw [dual_rotateR] refine hr.dual.rotateL hl.dual ?_ ?_ ?_ · rwa [size_dual, size_dual, add_comm] · rwa [size_dual, size_dual] · rwa [size_dual, size_dual] theorem Valid'.balance'_aux {l} {x : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hr : Valid' x r o₂) (H₁ : 2 * @size α r ≤ 9 * size l + 5 ∨ size r ≤ 3) (H₂ : 2 * @size α l ≤ 9 * size r + 5 ∨ size l ≤ 3) : Valid' o₁ (@balance' α l x r) o₂ := by rw [balance']; split_ifs with h h_1 h_2 · exact hl.node' hr (Or.inl h) · exact hl.rotateL hr h h_1 H₁ · exact hl.rotateR hr h h_2 H₂ · exact hl.node' hr (Or.inr ⟨not_lt.1 h_2, not_lt.1 h_1⟩) theorem Valid'.balance'_lemma {α l l' r r'} (H1 : BalancedSz l' r') (H2 : Nat.dist (@size α l) l' ≤ 1 ∧ size r = r' ∨ Nat.dist (size r) r' ≤ 1 ∧ size l = l') : 2 * @size α r ≤ 9 * size l + 5 ∨ size r ≤ 3 := by suffices @size α r ≤ 3 * (size l + 1) by omega rcases H2 with (⟨hl, rfl⟩ \| ⟨hr, rfl⟩) <;> rcases H1 with (h \| ⟨_, h₂⟩) · exact le_trans (Nat.le_add_left _ _) (le_trans h (Nat.le_add_left _ _)) · exact le_trans h₂ (Nat.mul_le_mul_left _ <\| le_trans (Nat.dist_tri_right _ _) (Nat.add_le_add_left hl _)) · exact le_trans (Nat.dist_tri_left' _ _) (le_trans (add_le_add hr (le_trans (Nat.le_add_left _ _) h)) (by omega)) · rw [Nat.mul_succ] exact le_trans (Nat.dist_tri_right' _ _) (add_le_add h₂ (le_trans hr (by decide))) theorem Valid'.balance' {l} {x : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hr : Valid' x r o₂) (H : ∃ l' r', BalancedSz l' r' ∧ (Nat.dist (size l) l' ≤ 1 ∧ size r = r' ∨ Nat.dist (size r) r' ≤ 1 ∧ size l = l')) : Valid' o₁ (@balance' α l x r) o₂ := let ⟨_, _, H1, H2⟩ := H Valid'.balance'_aux hl hr (Valid'.balance'_lemma H1 H2) (Valid'.balance'_lemma H1.symm H2.symm) theorem Valid'.balance {l} {x : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hr : Valid' x r o₂) (H : ∃ l' r', BalancedSz l' r' ∧ (Nat.dist (size l) l' ≤ 1 ∧ size r = r' ∨ Nat.dist (size r) r' ≤ 1 ∧ size l = l')) : Valid' o₁ (@balance α l x r) o₂ := by rw [balance_eq_balance' hl.3 hr.3 hl.2 hr.2]; exact hl.balance' hr H theorem Valid'.balanceL_aux {l} {x : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hr : Valid' x r o₂) (H₁ : size l = 0 → size r ≤ 1) (H₂ : 1 ≤ size l → 1 ≤ size r → size r ≤ delta * size l) (H₃ : 2 * @size α l ≤ 9 * size r + 5 ∨ size l ≤ 3) : Valid' o₁ (@balanceL α l x r) o₂ := by rw [balanceL_eq_balance hl.2 hr.2 H₁ H₂, balance_eq_balance' hl.3 hr.3 hl.2 hr.2] refine hl.balance'_aux hr (Or.inl ?_) H₃ rcases Nat.eq_zero_or_pos (size r) with r0 \| r0 · rw [r0]; exact Nat.zero_le _ rcases Nat.eq_zero_or_pos (size l) with l0 \| l0 · rw [l0]; exact le_trans (Nat.mul_le_mul_left _ (H₁ l0)) (by decide) replace H₂ : _ ≤ 3 * _ := H₂ l0 r0; omega theorem Valid'.balanceL {l} {x : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hr : Valid' x r o₂) (H : (∃ l', Raised l' (size l) ∧ BalancedSz l' (size r)) ∨ ∃ r', Raised (size r) r' ∧ BalancedSz (size l) r') : Valid' o₁ (@balanceL α l x r) o₂ := by rw [balanceL_eq_balance' hl.3 hr.3 hl.2 hr.2 H] refine hl.balance' hr ?_ rcases H with (⟨l', e, H⟩ \| ⟨r', e, H⟩) · exact ⟨_, _, H, Or.inl ⟨e.dist_le', rfl⟩⟩ · exact ⟨_, _, H, Or.inr ⟨e.dist_le, rfl⟩⟩ theorem Valid'.balanceR_aux {l} {x : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hr : Valid' x r o₂) (H₁ : size r = 0 → size l ≤ 1) (H₂ : 1 ≤ size r → 1 ≤ size l → size l ≤ delta * size r) (H₃ : 2 * @size α r ≤ 9 * size l + 5 ∨ size r ≤ 3) : Valid' o₁ (@balanceR α l x r) o₂ := by rw [Valid'.dual_iff, dual_balanceR] have := hr.dual.balanceL_aux hl.dual rw [size_dual, size_dual] at this exact this H₁ H₂ H₃ theorem Valid'.balanceR {l} {x : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hr : Valid' x r o₂) (H : (∃ l', Raised (size l) l' ∧ BalancedSz l' (size r)) ∨ ∃ r', Raised r' (size r) ∧ BalancedSz (size l) r') : Valid' o₁ (@balanceR α l x r) o₂ := by rw [Valid'.dual_iff, dual_balanceR]; exact hr.dual.balanceL hl.dual (balance_sz_dual H) theorem Valid'.eraseMax_aux {s l x r o₁ o₂} (H : Valid' o₁ (.node s l x r) o₂) : Valid' o₁ (@eraseMax α (.node' l x r)) ↑(findMax' x r) ∧ size (.node' l x r) = size (eraseMax (.node' l x r)) + 1 := by have := H.2.eq_node'; rw [this] at H; clear this induction r generalizing l x o₁ with \| nil => exact ⟨H.left, rfl⟩ \| node rs rl rx rr _ IHrr => have := H.2.2.2.eq_node'; rw [this] at H ⊢ rcases IHrr H.right with ⟨h, e⟩ refine ⟨Valid'.balanceL H.left h (Or.inr ⟨_, Or.inr e, H.3.1⟩), ?_⟩ rw [eraseMax, size_balanceL H.3.2.1 h.3 H.2.2.1 h.2 (Or.inr ⟨_, Or.inr e, H.3.1⟩)] rw [size_node, e]; rfl theorem Valid'.eraseMin_aux {s l} {x : α} {r o₁ o₂} (H : Valid' o₁ (.node s l x r) o₂) : Valid' ↑(findMin' l x) (@eraseMin α (.node' l x r)) o₂ ∧ size (.node' l x r) = size (eraseMin (.node' l x r)) + 1 := by have := H.dual.eraseMax_aux rwa [← dual_node', size_dual, ← dual_eraseMin, size_dual, ← Valid'.dual_iff, findMax'_dual] at this theorem eraseMin.valid : ∀ {t}, @Valid α _ t → Valid (eraseMin t) \| nil, _ => valid_nil \| node _ l x r, h => by rw [h.2.eq_node']; exact h.eraseMin_aux.1.valid theorem eraseMax.valid {t} (h : @Valid α _ t) : Valid (eraseMax t) := by rw [Valid.dual_iff, dual_eraseMax]; exact eraseMin.valid h.dual theorem Valid'.glue_aux {l r o₁ o₂} (hl : Valid' o₁ l o₂) (hr : Valid' o₁ r o₂) (sep : l.All fun x => r.All fun y => x < y) (bal : BalancedSz (size l) (size r)) : Valid' o₁ (@glue α l r) o₂ ∧ size (glue l r) = size l + size r := by obtain - \| ⟨ls, ll, lx, lr⟩ := l; · exact ⟨hr, (zero_add _).symm⟩ obtain - \| ⟨rs, rl, rx, rr⟩ := r; · exact ⟨hl, rfl⟩ dsimp [glue]; split_ifs · rw [splitMax_eq] · obtain ⟨v, e⟩ := Valid'.eraseMax_aux hl suffices H : _ by refine ⟨Valid'.balanceR v (hr.of_gt ?_ ?_) H, ?_⟩ · refine findMax'_all (P := fun a : α => Bounded nil (a : WithTop α) o₂) lx lr hl.1.2.to_nil (sep.2.2.imp ?_) exact fun x h => hr.1.2.to_nil.mono_left (le_of_lt h.2.1) · exact @findMax'_all _ (fun a => All (· > a) (.node rs rl rx rr)) lx lr sep.2.1 sep.2.2 · rw [size_balanceR v.3 hr.3 v.2 hr.2 H, add_right_comm, ← e, hl.2.1]; rfl refine Or.inl ⟨_, Or.inr e, ?_⟩ rwa [hl.2.eq_node'] at bal · rw [splitMin_eq] · obtain ⟨v, e⟩ := Valid'.eraseMin_aux hr suffices H : _ by refine ⟨Valid'.balanceL (hl.of_lt ?_ ?_) v H, ?_⟩ · refine @findMin'_all (P := fun a : α => Bounded nil o₁ (a : WithBot α)) _ rl rx (sep.2.1.1.imp ?_) hr.1.1.to_nil exact fun y h => hl.1.1.to_nil.mono_right (le_of_lt h) · exact @findMin'_all _ (fun a => All (· < a) (.node ls ll lx lr)) rl rx (all_iff_forall.2 fun x hx => sep.imp fun y hy => all_iff_forall.1 hy.1 _ hx) (sep.imp fun y hy => hy.2.1) · rw [size_balanceL hl.3 v.3 hl.2 v.2 H, add_assoc, ← e, hr.2.1]; rfl refine Or.inr ⟨_, Or.inr e, ?_⟩ rwa [hr.2.eq_node'] at bal theorem Valid'.glue {l} {x : α} {r o₁ o₂} (hl : Valid' o₁ l x) (hr : Valid' x r o₂) : BalancedSz (size l) (size r) → Valid' o₁ (@glue α l r) o₂ ∧ size (@glue α l r) = size l + size r := Valid'.glue_aux (hl.trans_right hr.1) (hr.trans_left hl.1) (hl.1.to_sep hr.1) theorem Valid'.merge_lemma {a b c : ℕ} (h₁ : 3 * a < b + c + 1) (h₂ : b ≤ 3 * c) : 2 * (a + b) ≤ 9 * c + 5 := by omega theorem Valid'.merge_aux₁ {o₁ o₂ ls ll lx lr rs rl rx rr t} (hl : Valid' o₁ (@Ordnode.node α ls ll lx lr) o₂) (hr : Valid' o₁ (.node rs rl rx rr) o₂) (h : delta * ls < rs) (v : Valid' o₁ t rx) (e : size t = ls + size rl) : Valid' o₁ (.balanceL t rx rr) o₂ ∧ size (.balanceL t rx rr) = ls + rs := by rw [hl.2.1] at e rw [hl.2.1, hr.2.1, delta] at h rcases hr.3.1 with (H \| ⟨hr₁, hr₂⟩); · omega suffices H₂ : _ by suffices H₁ : _ by refine ⟨Valid'.balanceL_aux v hr.right H₁ H₂ ?_, ?_⟩ · rw [e]; exact Or.inl (Valid'.merge_lemma h hr₁) · rw [balanceL_eq_balance v.2 hr.2.2.2 H₁ H₂, balance_eq_balance' v.3 hr.3.2.2 v.2 hr.2.2.2, size_balance' v.2 hr.2.2.2, e, hl.2.1, hr.2.1] abel · rw [e, add_right_comm]; rintro ⟨⟩ intro _ _; rw [e]; unfold delta at hr₂ ⊢; omega theorem Valid'.merge_aux {l r o₁ o₂} (hl : Valid' o₁ l o₂) (hr : Valid' o₁ r o₂) (sep : l.All fun x => r.All fun y => x < y) : Valid' o₁ (@merge α l r) o₂ ∧ size (merge l r) = size l + size r := by induction l generalizing o₁ o₂ r with \| nil => exact ⟨hr, (zero_add _).symm⟩ \| node ls ll lx lr _ IHlr => ?_ induction r generalizing o₁ o₂ with \| nil => exact ⟨hl, rfl⟩ \| node rs rl rx rr IHrl _ => ?_ rw [merge_node]; split_ifs with h h_1 · obtain ⟨v, e⟩ := IHrl (hl.of_lt hr.1.1.to_nil <\| sep.imp fun x h => h.2.1) hr.left (sep.imp fun x h => h.1) exact Valid'.merge_aux₁ hl hr h v e · obtain ⟨v, e⟩ := IHlr hl.right (hr.of_gt hl.1.2.to_nil sep.2.1) sep.2.2 have := Valid'.merge_aux₁ hr.dual hl.dual h_1 v.dual rw [size_dual, add_comm, size_dual, ← dual_balanceR, ← Valid'.dual_iff, size_dual, add_comm rs] at this exact this e · refine Valid'.glue_aux hl hr sep (Or.inr ⟨not_lt.1 h_1, not_lt.1 h⟩) theorem Valid.merge {l r} (hl : Valid l) (hr : Valid r) (sep : l.All fun x => r.All fun y => x < y) : Valid (@merge α l r) := (Valid'.merge_aux hl hr sep).1 theorem insertWith.valid_aux [IsTotal α (· ≤ ·)] [DecidableLE α] (f : α → α) (x : α) (hf : ∀ y, x ≤ y ∧ y ≤ x → x ≤ f y ∧ f y ≤ x) : ∀ {t o₁ o₂}, Valid' o₁ t o₂ → Bounded nil o₁ x → Bounded nil x o₂ → Valid' o₁ (insertWith f x t) o₂ ∧ Raised (size t) (size (insertWith f x t)) \| nil, _, _, _, bl, br => ⟨valid'_singleton bl br, Or.inr rfl⟩ \| node sz l y r, o₁, o₂, h, bl, br => by rw [insertWith, cmpLE] split_ifs with h_1 h_2 <;> dsimp only · rcases h with ⟨⟨lx, xr⟩, hs, hb⟩ rcases hf _ ⟨h_1, h_2⟩ with ⟨xf, fx⟩ refine ⟨⟨⟨lx.mono_right (le_trans h_2 xf), xr.mono_left (le_trans fx h_1)⟩, hs, hb⟩, Or.inl rfl⟩ · rcases insertWith.valid_aux f x hf h.left bl (lt_of_le_not_le h_1 h_2) with ⟨vl, e⟩ suffices H : _ by refine ⟨vl.balanceL h.right H, ?_⟩ rw [size_balanceL vl.3 h.3.2.2 vl.2 h.2.2.2 H, h.2.size_eq] exact (e.add_right _).add_right _ exact Or.inl ⟨_, e, h.3.1⟩ · have : y < x := lt_of_le_not_le ((total_of (· ≤ ·) _ _).resolve_left h_1) h_1 rcases insertWith.valid_aux f x hf h.right this br with ⟨vr, e⟩ suffices H : _ by refine ⟨h.left.balanceR vr H, ?_⟩ rw [size_balanceR h.3.2.1 vr.3 h.2.2.1 vr.2 H, h.2.size_eq] exact (e.add_left _).add_right _ exact Or.inr ⟨_, e, h.3.1⟩ theorem insertWith.valid [IsTotal α (· ≤ ·)] [DecidableLE α] (f : α → α) (x : α) (hf : ∀ y, x ≤ y ∧ y ≤ x → x ≤ f y ∧ f y ≤ x) {t} (h : Valid t) : Valid (insertWith f x t) := (insertWith.valid_aux _ _ hf h ⟨⟩ ⟨⟩).1 theorem insert_eq_insertWith [DecidableLE α] (x : α) : ∀ t, Ordnode.insert x t = insertWith (fun _ => x) x t \| nil => rfl \| node _ l y r => by unfold Ordnode.insert insertWith; cases cmpLE x y <;> simp [insert_eq_insertWith] theorem insert.valid [IsTotal α (· ≤ ·)] [DecidableLE α] (x : α) {t} (h : Valid t) : Valid (Ordnode.insert x t) := by rw [insert_eq_insertWith]; exact insertWith.valid _ _ (fun _ _ => ⟨le_rfl, le_rfl⟩) h theorem insert'_eq_insertWith [DecidableLE α] (x : α) : ∀ t, insert' x t = insertWith id x t \| nil => rfl \| node _ l y r => by unfold insert' insertWith; cases cmpLE x y <;> simp [insert'_eq_insertWith] theorem insert'.valid [IsTotal α (· ≤ ·)] [DecidableLE α] (x : α) {t} (h : Valid t) : Valid (insert' x t) := by rw [insert'_eq_insertWith]; exact insertWith.valid _ _ (fun _ => id) h theorem Valid'.map_aux {β} [Preorder β] {f : α → β} (f_strict_mono : StrictMono f) {t a₁ a₂} (h : Valid' a₁ t a₂) : Valid' (Option.map f a₁) (map f t) (Option.map f a₂) ∧ (map f t).size = t.size := by induction t generalizing a₁ a₂ with \| nil => simp only [map, size_nil, and_true]; apply valid'_nil cases a₁; · trivial cases a₂; · trivial simp only [Option.map, Bounded] exact f_strict_mono h.ord \| node _ _ _ _ t_ih_l t_ih_r => have t_ih_l' := t_ih_l h.left have t_ih_r' := t_ih_r h.right clear t_ih_l t_ih_r obtain ⟨t_l_valid, t_l_size⟩ := t_ih_l' obtain ⟨t_r_valid, t_r_size⟩ := t_ih_r' simp only [map, size_node, and_true] constructor · exact And.intro t_l_valid.ord t_r_valid.ord · constructor · rw [t_l_size, t_r_size]; exact h.sz.1 · constructor · exact t_l_valid.sz · exact t_r_valid.sz · constructor · rw [t_l_size, t_r_size]; exact h.bal.1 · constructor · exact t_l_valid.bal · exact t_r_valid.bal theorem map.valid {β} [Preorder β] {f : α → β} (f_strict_mono : StrictMono f) {t} (h : Valid t) : Valid (map f t) := (Valid'.map_aux f_strict_mono h).1 theorem Valid'.erase_aux [DecidableLE α] (x : α) {t a₁ a₂} (h : Valid' a₁ t a₂) : Valid' a₁ (erase x t) a₂ ∧ Raised (erase x t).size t.size := by induction t generalizing a₁ a₂ with \| nil => simpa [erase, Raised] \| node _ t_l t_x t_r t_ih_l t_ih_r => simp only [erase, size_node] have t_ih_l' := t_ih_l h.left have t_ih_r' := t_ih_r h.right clear t_ih_l t_ih_r obtain ⟨t_l_valid, t_l_size⟩ := t_ih_l' obtain ⟨t_r_valid, t_r_size⟩ := t_ih_r' cases cmpLE x t_x <;> rw [h.sz.1] · suffices h_balanceable : _ by constructor · exact Valid'.balanceR t_l_valid h.right h_balanceable · rw [size_balanceR t_l_valid.bal h.right.bal t_l_valid.sz h.right.sz h_balanceable] repeat apply Raised.add_right exact t_l_size left; exists t_l.size; exact And.intro t_l_size h.bal.1 · have h_glue := Valid'.glue h.left h.right h.bal.1 obtain ⟨h_glue_valid, h_glue_sized⟩ := h_glue constructor · exact h_glue_valid · right; rw [h_glue_sized] · suffices h_balanceable : _ by constructor · exact Valid'.balanceL h.left t_r_valid h_balanceable · rw [size_balanceL h.left.bal t_r_valid.bal h.left.sz t_r_valid.sz h_balanceable] apply Raised.add_right apply Raised.add_left exact t_r_size right; exists t_r.size; exact And.intro t_r_size h.bal.1 theorem erase.valid [DecidableLE α] (x : α) {t} (h : Valid t) : Valid (erase x t) := (Valid'.erase_aux x h).1 theorem size_erase_of_mem [DecidableLE α] {x : α} {t a₁ a₂} (h : Valid' a₁ t a₂) (h_mem : x ∈ t) : size (erase x t) = size t - 1 := by induction t generalizing a₁ a₂ with \| nil => contradiction \| node _ t_l t_x t_r t_ih_l t_ih_r => have t_ih_l' := t_ih_l h.left have t_ih_r' := t_ih_r h.right clear t_ih_l t_ih_r dsimp only [Membership.mem, mem] at h_mem unfold erase revert h_mem; cases cmpLE x t_x <;> intro h_mem <;> dsimp only at h_mem ⊢ · have t_ih_l := t_ih_l' h_mem clear t_ih_l' t_ih_r' have t_l_h := Valid'.erase_aux x h.left obtain ⟨t_l_valid, t_l_size⟩ := t_l_h rw [size_balanceR t_l_valid.bal h.right.bal t_l_valid.sz h.right.sz (Or.inl (Exists.intro t_l.size (And.intro t_l_size h.bal.1)))] rw [t_ih_l, h.sz.1] have h_pos_t_l_size := pos_size_of_mem h.left.sz h_mem revert h_pos_t_l_size; rcases t_l.size with - \| t_l_size <;> intro h_pos_t_l_size · cases h_pos_t_l_size · simp [Nat.add_right_comm] · rw [(Valid'.glue h.left h.right h.bal.1).2, h.sz.1]; rfl · have t_ih_r := t_ih_r' h_mem clear t_ih_l' t_ih_r' have t_r_h := Valid'.erase_aux x h.right obtain ⟨t_r_valid, t_r_size⟩ := t_r_h rw [size_balanceL h.left.bal t_r_valid.bal h.left.sz t_r_valid.sz (Or.inr (Exists.intro t_r.size (And.intro t_r_size h.bal.1)))] rw [t_ih_r, h.sz.1] have h_pos_t_r_size := pos_size_of_mem h.right.sz h_mem revert h_pos_t_r_size; rcases t_r.size with - \| t_r_size <;> intro h_pos_t_r_size · cases h_pos_t_r_size · simp [Nat.add_assoc] end Valid end Ordnode /-- An `Ordset α` is a finite set of values, represented as a tree. The operations on this type maintain that the tree is balanced and correctly stores subtree sizes at each level. The correctness property of the tree is baked into the type, so all operations on this type are correct by construction. -/ def Ordset (α : Type*) [Preorder α] := { t : Ordnode α // t.Valid } namespace Ordset open Ordnode variable [Preorder α] /-- O(1). The empty set. -/ nonrec def nil : Ordset α := ⟨nil, ⟨⟩, ⟨⟩, ⟨⟩⟩ /-- O(1). Get the size of the set. -/ def size (s : Ordset α) : ℕ := s.1.size /-- O(1). Construct a singleton set containing value `a`. -/ protected def singleton (a : α) : Ordset α := ⟨singleton a, valid_singleton⟩ instance instEmptyCollection : EmptyCollection (Ordset α) := ⟨nil⟩ instance instInhabited : Inhabited (Ordset α) := ⟨nil⟩ instance instSingleton : Singleton α (Ordset α) := ⟨Ordset.singleton⟩ /-- O(1). Is the set empty? -/ def Empty (s : Ordset α) : Prop := s = ∅ theorem empty_iff {s : Ordset α} : s = ∅ ↔ s.1.empty := ⟨fun h => by cases h; exact rfl, fun h => by cases s with \| mk s_val _ => cases s_val <;> [rfl; cases h]⟩ instance Empty.instDecidablePred : DecidablePred (@Empty α _) := fun _ => decidable_of_iff' _ empty_iff /-- O(log n). Insert an element into the set, preserving balance and the BST property. If an equivalent element is already in the set, this replaces it. -/ protected def insert [IsTotal α (· ≤ ·)] [DecidableLE α] (x : α) (s : Ordset α) : Ordset α := ⟨Ordnode.insert x s.1, insert.valid _ s.2⟩ instance instInsert [IsTotal α (· ≤ ·)] [DecidableLE α] : Insert α (Ordset α) := ⟨Ordset.insert⟩ /-- O(log n). Insert an element into the set, preserving balance and the BST property. If an equivalent element is already in the set, the set is returned as is. -/ nonrec def insert' [IsTotal α (· ≤ ·)] [DecidableLE α] (x : α) (s : Ordset α) : Ordset α := ⟨insert' x s.1, insert'.valid _ s.2⟩ section variable [DecidableLE α] /-- O(log n). Does the set contain the element `x`? That is, is there an element that is equivalent to `x` in the order? -/ def mem (x : α) (s : Ordset α) : Bool := x ∈ s.val /-- O(log n). Retrieve an element in the set that is equivalent to `x` in the order, if it exists. -/ def find (x : α) (s : Ordset α) : Option α := Ordnode.find x s.val instance instMembership : Membership α (Ordset α) := ⟨fun s x => mem x s⟩ instance mem.decidable (x : α) (s : Ordset α) : Decidable (x ∈ s) := instDecidableEqBool _ _ theorem pos_size_of_mem {x : α} {t : Ordset α} (h_mem : x ∈ t) : 0 < size t := by simp? [Membership.mem, mem] at h_mem says simp only [Membership.mem, mem, Bool.decide_eq_true] at h_mem apply Ordnode.pos_size_of_mem t.property.sz h_mem end /-- O(log n). Remove an element from the set equivalent to `x`. Does nothing if there is no such element. -/ def erase [DecidableLE α] (x : α) (s : Ordset α) : Ordset α := ⟨Ordnode.erase x s.val, Ordnode.erase.valid x s.property⟩ /-- O(n). Map a function across a tree, without changing the structure. -/ def map {β} [Preorder β] (f : α → β) (f_strict_mono : StrictMono f) (s : Ordset α) : Ordset β := ⟨Ordnode.map f s.val, Ordnode.map.valid f_strict_mono s.property⟩ end Ordset		Mathlib/Data/Ordmap/Ordset.lean	1,220	1,221
/- 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	Mathlib/Analysis/Normed/Group/Basic.lean	578	580
/- Copyright (c) 2022 Jake Levinson. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jake Levinson -/ import Mathlib.Combinatorics.Young.YoungDiagram /-! # Semistandard Young tableaux A semistandard Young tableau is a filling of a Young diagram by natural numbers, such that the entries are weakly increasing left-to-right along rows (i.e. for fixed `i`), and strictly-increasing top-to-bottom along columns (i.e. for fixed `j`). An example of an SSYT of shape `μ = [4, 2, 1]` is: ```text 0 0 0 2 1 1 2 ``` We represent a semistandard Young tableau as a function `ℕ → ℕ → ℕ`, which is required to be zero for all pairs `(i, j) ∉ μ` and to satisfy the row-weak and column-strict conditions on `μ`. ## Main definitions - `SemistandardYoungTableau (μ : YoungDiagram)`: semistandard Young tableaux of shape `μ`. There is a `coe` instance such that `T i j` is value of the `(i, j)` entry of the semistandard Young tableau `T`. - `SemistandardYoungTableau.highestWeight (μ : YoungDiagram)`: the semistandard Young tableau whose `i`th row consists entirely of `i`s, for each `i`. ## Tags Semistandard Young tableau ## References <https://en.wikipedia.org/wiki/Young_tableau> -/ /-- A semistandard Young tableau is a filling of the cells of a Young diagram by natural numbers, such that the entries in each row are weakly increasing (left to right), and the entries in each column are strictly increasing (top to bottom). Here, a semistandard Young tableau is represented as an unrestricted function `ℕ → ℕ → ℕ` that, for reasons of extensionality, is required to vanish outside `μ`. -/ structure SemistandardYoungTableau (μ : YoungDiagram) where /-- `entry i j` is value of the `(i, j)` entry of the SSYT `μ`. -/ entry : ℕ → ℕ → ℕ /-- The entries in each row are weakly increasing (left to right). -/ row_weak' : ∀ {i j1 j2 : ℕ}, j1 < j2 → (i, j2) ∈ μ → entry i j1 ≤ entry i j2 /-- The entries in each column are strictly increasing (top to bottom). -/ col_strict' : ∀ {i1 i2 j : ℕ}, i1 < i2 → (i2, j) ∈ μ → entry i1 j < entry i2 j /-- `entry` is required to be zero for all pairs `(i, j) ∉ μ`. -/ zeros' : ∀ {i j}, (i, j) ∉ μ → entry i j = 0 namespace SemistandardYoungTableau instance instFunLike {μ : YoungDiagram} : FunLike (SemistandardYoungTableau μ) ℕ (ℕ → ℕ) where coe := SemistandardYoungTableau.entry coe_injective' T T' h := by cases T cases T' congr @[simp] theorem to_fun_eq_coe {μ : YoungDiagram} {T : SemistandardYoungTableau μ} : T.entry = (T : ℕ → ℕ → ℕ) := rfl @[ext] theorem ext {μ : YoungDiagram} {T T' : SemistandardYoungTableau μ} (h : ∀ i j, T i j = T' i j) : T = T' := DFunLike.ext T T' fun _ ↦ by funext apply h /-- Copy of an `SemistandardYoungTableau μ` with a new `entry` equal to the old one. Useful to fix definitional equalities. -/ protected def copy {μ : YoungDiagram} (T : SemistandardYoungTableau μ) (entry' : ℕ → ℕ → ℕ) (h : entry' = T) : SemistandardYoungTableau μ where entry := entry' row_weak' := h.symm ▸ T.row_weak' col_strict' := h.symm ▸ T.col_strict' zeros' := h.symm ▸ T.zeros' @[simp] theorem coe_copy {μ : YoungDiagram} (T : SemistandardYoungTableau μ) (entry' : ℕ → ℕ → ℕ) (h : entry' = T) : ⇑(T.copy entry' h) = entry' := rfl theorem copy_eq {μ : YoungDiagram} (T : SemistandardYoungTableau μ) (entry' : ℕ → ℕ → ℕ) (h : entry' = T) : T.copy entry' h = T := DFunLike.ext' h theorem row_weak {μ : YoungDiagram} (T : SemistandardYoungTableau μ) {i j1 j2 : ℕ} (hj : j1 < j2) (hcell : (i, j2) ∈ μ) : T i j1 ≤ T i j2 := T.row_weak' hj hcell theorem col_strict {μ : YoungDiagram} (T : SemistandardYoungTableau μ) {i1 i2 j : ℕ} (hi : i1 < i2) (hcell : (i2, j) ∈ μ) : T i1 j < T i2 j := T.col_strict' hi hcell theorem zeros {μ : YoungDiagram} (T : SemistandardYoungTableau μ) {i j : ℕ} (not_cell : (i, j) ∉ μ) : T i j = 0 := T.zeros' not_cell theorem row_weak_of_le {μ : YoungDiagram} (T : SemistandardYoungTableau μ) {i j1 j2 : ℕ} (hj : j1 ≤ j2) (cell : (i, j2) ∈ μ) : T i j1 ≤ T i j2 := by rcases eq_or_lt_of_le hj with h \| h · rw [h] · exact T.row_weak h cell theorem col_weak {μ : YoungDiagram} (T : SemistandardYoungTableau μ) {i1 i2 j : ℕ} (hi : i1 ≤ i2) (cell : (i2, j) ∈ μ) : T i1 j ≤ T i2 j := by rcases eq_or_lt_of_le hi with h \| h · rw [h] · exact le_of_lt (T.col_strict h cell) /-- The "highest weight" SSYT of a given shape has all i's in row i, for each i. -/ def highestWeight (μ : YoungDiagram) : SemistandardYoungTableau μ where entry i j := if (i, j) ∈ μ then i else 0 row_weak' hj hcell := by rw [if_pos hcell, if_pos (μ.up_left_mem (by rfl) (le_of_lt hj) hcell)] col_strict' hi hcell := by rwa [if_pos hcell, if_pos (μ.up_left_mem (le_of_lt hi) (by rfl) hcell)] zeros' not_cell := if_neg not_cell @[simp] theorem highestWeight_apply {μ : YoungDiagram} {i j : ℕ} :	highestWeight μ i j = if (i, j) ∈ μ then i else 0 := rfl instance {μ : YoungDiagram} : Inhabited (SemistandardYoungTableau μ) := ⟨highestWeight μ⟩	Mathlib/Combinatorics/Young/SemistandardTableau.lean	136	140
/- Copyright (c) 2020 Zhouhang Zhou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Zhouhang Zhou, Yury Kudryashov -/ import Mathlib.MeasureTheory.Integral.Bochner.ContinuousLinearMap import Mathlib.MeasureTheory.Integral.Bochner.FundThmCalculus import Mathlib.MeasureTheory.Integral.Bochner.Set deprecated_module (since := "2025-04-15")		Mathlib/MeasureTheory/Integral/SetIntegral.lean	103	104
/- Copyright (c) 2023 Yaël Dillies. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yaël Dillies -/ import Mathlib.Algebra.Field.Basic import Mathlib.Algebra.NoZeroSMulDivisors.Basic import Mathlib.Data.Int.ModEq import Mathlib.GroupTheory.QuotientGroup.Defs import Mathlib.Algebra.Group.Subgroup.ZPowers.Basic /-! # Equality modulo an element This file defines equality modulo an element in a commutative group. ## Main definitions * `a ≡ b [PMOD p]`: `a` and `b` are congruent modulo `p`. ## See also `SModEq` is a generalisation to arbitrary submodules. ## TODO Delete `Int.ModEq` in favour of `AddCommGroup.ModEq`. Generalise `SModEq` to `AddSubgroup` and redefine `AddCommGroup.ModEq` using it. Once this is done, we can rename `AddCommGroup.ModEq` to `AddSubgroup.ModEq` and multiplicativise it. Longer term, we could generalise to submonoids and also unify with `Nat.ModEq`. -/ namespace AddCommGroup variable {α : Type} section AddCommGroup variable [AddCommGroup α] {p a a₁ a₂ b b₁ b₂ c : α} {n : ℕ} {z : ℤ} /-- `a ≡ b [PMOD p]` means that `b` is congruent to `a` modulo `p`. Equivalently (as shown in `Algebra.Order.ToIntervalMod`), `b` does not lie in the open interval `(a, a + p)` modulo `p`, or `toIcoMod hp a` disagrees with `toIocMod hp a` at `b`, or `toIcoDiv hp a` disagrees with `toIocDiv hp a` at `b`. -/ def ModEq (p a b : α) : Prop := ∃ z : ℤ, b - a = z • p @[inherit_doc] notation:50 a " ≡ " b " [PMOD " p "]" => ModEq p a b @[refl, simp] theorem modEq_refl (a : α) : a ≡ a [PMOD p] := ⟨0, by simp⟩ theorem modEq_rfl : a ≡ a [PMOD p] := modEq_refl _ theorem modEq_comm : a ≡ b [PMOD p] ↔ b ≡ a [PMOD p] := (Equiv.neg _).exists_congr_left.trans <\| by simp [ModEq, ← neg_eq_iff_eq_neg] alias ⟨ModEq.symm, _⟩ := modEq_comm attribute [symm] ModEq.symm @[trans] theorem ModEq.trans : a ≡ b [PMOD p] → b ≡ c [PMOD p] → a ≡ c [PMOD p] := fun ⟨m, hm⟩ ⟨n, hn⟩ => ⟨m + n, by simp [add_smul, ← hm, ← hn]⟩ instance : IsRefl _ (ModEq p) := ⟨modEq_refl⟩ @[simp] theorem neg_modEq_neg : -a ≡ -b [PMOD p] ↔ a ≡ b [PMOD p] := modEq_comm.trans <\| by simp [ModEq, neg_add_eq_sub] alias ⟨ModEq.of_neg, ModEq.neg⟩ := neg_modEq_neg @[simp] theorem modEq_neg : a ≡ b [PMOD -p] ↔ a ≡ b [PMOD p] := modEq_comm.trans <\| by simp [ModEq, ← neg_eq_iff_eq_neg] alias ⟨ModEq.of_neg', ModEq.neg'⟩ := modEq_neg theorem modEq_sub (a b : α) : a ≡ b [PMOD b - a] := ⟨1, (one_smul _ _).symm⟩ @[simp] theorem modEq_zero : a ≡ b [PMOD 0] ↔ a = b := by simp [ModEq, sub_eq_zero, eq_comm] @[simp] theorem self_modEq_zero : p ≡ 0 [PMOD p] := ⟨-1, by simp⟩ @[simp] theorem zsmul_modEq_zero (z : ℤ) : z • p ≡ 0 [PMOD p] := ⟨-z, by simp⟩ theorem add_zsmul_modEq (z : ℤ) : a + z • p ≡ a [PMOD p] := ⟨-z, by simp⟩ theorem zsmul_add_modEq (z : ℤ) : z • p + a ≡ a [PMOD p] := ⟨-z, by simp [← sub_sub]⟩ theorem add_nsmul_modEq (n : ℕ) : a + n • p ≡ a [PMOD p] := ⟨-n, by simp⟩ theorem nsmul_add_modEq (n : ℕ) : n • p + a ≡ a [PMOD p] := ⟨-n, by simp [← sub_sub]⟩ namespace ModEq protected theorem add_zsmul (z : ℤ) : a ≡ b [PMOD p] → a + z • p ≡ b [PMOD p] := (add_zsmul_modEq _).trans protected theorem zsmul_add (z : ℤ) : a ≡ b [PMOD p] → z • p + a ≡ b [PMOD p] := (zsmul_add_modEq _).trans protected theorem add_nsmul (n : ℕ) : a ≡ b [PMOD p] → a + n • p ≡ b [PMOD p] := (add_nsmul_modEq _).trans protected theorem nsmul_add (n : ℕ) : a ≡ b [PMOD p] → n • p + a ≡ b [PMOD p] := (nsmul_add_modEq _).trans protected theorem of_zsmul : a ≡ b [PMOD z • p] → a ≡ b [PMOD p] := fun ⟨m, hm⟩ => ⟨m z, by rwa [mul_smul]⟩ protected theorem of_nsmul : a ≡ b [PMOD n • p] → a ≡ b [PMOD p] := fun ⟨m, hm⟩ => ⟨m * n, by rwa [mul_smul, natCast_zsmul]⟩ protected theorem zsmul : a ≡ b [PMOD p] → z • a ≡ z • b [PMOD z • p] := Exists.imp fun m hm => by rw [← smul_sub, hm, smul_comm] protected theorem nsmul : a ≡ b [PMOD p] → n • a ≡ n • b [PMOD n • p] := Exists.imp fun m hm => by rw [← smul_sub, hm, smul_comm] end ModEq @[simp] theorem zsmul_modEq_zsmul [NoZeroSMulDivisors ℤ α] (hn : z ≠ 0) : z • a ≡ z • b [PMOD z • p] ↔ a ≡ b [PMOD p] := exists_congr fun m => by rw [← smul_sub, smul_comm, smul_right_inj hn] @[simp] theorem nsmul_modEq_nsmul [NoZeroSMulDivisors ℕ α] (hn : n ≠ 0) : n • a ≡ n • b [PMOD n • p] ↔ a ≡ b [PMOD p] := exists_congr fun m => by rw [← smul_sub, smul_comm, smul_right_inj hn] alias ⟨ModEq.zsmul_cancel, _⟩ := zsmul_modEq_zsmul alias ⟨ModEq.nsmul_cancel, _⟩ := nsmul_modEq_nsmul namespace ModEq @[simp] protected theorem add_iff_left : a₁ ≡ b₁ [PMOD p] → (a₁ + a₂ ≡ b₁ + b₂ [PMOD p] ↔ a₂ ≡ b₂ [PMOD p]) := fun ⟨m, hm⟩ => (Equiv.addLeft m).symm.exists_congr_left.trans <\| by simp [add_sub_add_comm, hm, add_smul, ModEq] @[simp] protected theorem add_iff_right : a₂ ≡ b₂ [PMOD p] → (a₁ + a₂ ≡ b₁ + b₂ [PMOD p] ↔ a₁ ≡ b₁ [PMOD p]) := fun ⟨m, hm⟩ => (Equiv.addRight m).symm.exists_congr_left.trans <\| by simp [add_sub_add_comm, hm, add_smul, ModEq] @[simp] protected theorem sub_iff_left : a₁ ≡ b₁ [PMOD p] → (a₁ - a₂ ≡ b₁ - b₂ [PMOD p] ↔ a₂ ≡ b₂ [PMOD p]) := fun ⟨m, hm⟩ => (Equiv.subLeft m).symm.exists_congr_left.trans <\| by simp [sub_sub_sub_comm, hm, sub_smul, ModEq] @[simp] protected theorem sub_iff_right : a₂ ≡ b₂ [PMOD p] → (a₁ - a₂ ≡ b₁ - b₂ [PMOD p] ↔ a₁ ≡ b₁ [PMOD p]) := fun ⟨m, hm⟩ => (Equiv.subRight m).symm.exists_congr_left.trans <\| by simp [sub_sub_sub_comm, hm, sub_smul, ModEq] protected alias ⟨add_left_cancel, add⟩ := ModEq.add_iff_left protected alias ⟨add_right_cancel, _⟩ := ModEq.add_iff_right protected alias ⟨sub_left_cancel, sub⟩ := ModEq.sub_iff_left protected alias ⟨sub_right_cancel, _⟩ := ModEq.sub_iff_right protected theorem add_left (c : α) (h : a ≡ b [PMOD p]) : c + a ≡ c + b [PMOD p] := modEq_rfl.add h protected theorem sub_left (c : α) (h : a ≡ b [PMOD p]) : c - a ≡ c - b [PMOD p] := modEq_rfl.sub h protected theorem add_right (c : α) (h : a ≡ b [PMOD p]) : a + c ≡ b + c [PMOD p] := h.add modEq_rfl protected theorem sub_right (c : α) (h : a ≡ b [PMOD p]) : a - c ≡ b - c [PMOD p] := h.sub modEq_rfl protected theorem add_left_cancel' (c : α) : c + a ≡ c + b [PMOD p] → a ≡ b [PMOD p] := modEq_rfl.add_left_cancel protected theorem add_right_cancel' (c : α) : a + c ≡ b + c [PMOD p] → a ≡ b [PMOD p] := modEq_rfl.add_right_cancel protected theorem sub_left_cancel' (c : α) : c - a ≡ c - b [PMOD p] → a ≡ b [PMOD p] := modEq_rfl.sub_left_cancel protected theorem sub_right_cancel' (c : α) : a - c ≡ b - c [PMOD p] → a ≡ b [PMOD p] := modEq_rfl.sub_right_cancel end ModEq theorem modEq_sub_iff_add_modEq' : a ≡ b - c [PMOD p] ↔ c + a ≡ b [PMOD p] := by simp [ModEq, sub_sub] theorem modEq_sub_iff_add_modEq : a ≡ b - c [PMOD p] ↔ a + c ≡ b [PMOD p] := modEq_sub_iff_add_modEq'.trans <\| by rw [add_comm] theorem sub_modEq_iff_modEq_add' : a - b ≡ c [PMOD p] ↔ a ≡ b + c [PMOD p] := modEq_comm.trans <\| modEq_sub_iff_add_modEq'.trans modEq_comm theorem sub_modEq_iff_modEq_add : a - b ≡ c [PMOD p] ↔ a ≡ c + b [PMOD p] := modEq_comm.trans <\| modEq_sub_iff_add_modEq.trans modEq_comm @[simp] theorem sub_modEq_zero : a - b ≡ 0 [PMOD p] ↔ a ≡ b [PMOD p] := by simp [sub_modEq_iff_modEq_add] @[simp] theorem add_modEq_left : a + b ≡ a [PMOD p] ↔ b ≡ 0 [PMOD p] := by simp [← modEq_sub_iff_add_modEq'] @[simp] theorem add_modEq_right : a + b ≡ b [PMOD p] ↔ a ≡ 0 [PMOD p] := by simp [← modEq_sub_iff_add_modEq] theorem modEq_iff_eq_add_zsmul : a ≡ b [PMOD p] ↔ ∃ z : ℤ, b = a + z • p := by simp_rw [ModEq, sub_eq_iff_eq_add'] theorem not_modEq_iff_ne_add_zsmul : ¬a ≡ b [PMOD p] ↔ ∀ z : ℤ, b ≠ a + z • p := by rw [modEq_iff_eq_add_zsmul, not_exists] theorem modEq_iff_eq_mod_zmultiples : a ≡ b [PMOD p] ↔ (b : α ⧸ AddSubgroup.zmultiples p) = a := by simp_rw [modEq_iff_eq_add_zsmul, QuotientAddGroup.eq_iff_sub_mem, AddSubgroup.mem_zmultiples_iff, eq_sub_iff_add_eq', eq_comm] theorem not_modEq_iff_ne_mod_zmultiples : ¬a ≡ b [PMOD p] ↔ (b : α ⧸ AddSubgroup.zmultiples p) ≠ a := modEq_iff_eq_mod_zmultiples.not end AddCommGroup @[simp] theorem modEq_iff_int_modEq {a b z : ℤ} : a ≡ b [PMOD z] ↔ a ≡ b [ZMOD z] := by simp [ModEq, dvd_iff_exists_eq_mul_left, Int.modEq_iff_dvd] section AddCommGroupWithOne variable [AddCommGroupWithOne α] [CharZero α] @[simp, norm_cast] theorem intCast_modEq_intCast {a b z : ℤ} : a ≡ b [PMOD (z : α)] ↔ a ≡ b [PMOD z] := by simp_rw [ModEq, ← Int.cast_mul_eq_zsmul_cast] norm_cast @[simp, norm_cast] lemma intCast_modEq_intCast' {a b : ℤ} {n : ℕ} : a ≡ b [PMOD (n : α)] ↔ a ≡ b [PMOD (n : ℤ)] := by simpa using intCast_modEq_intCast (α := α) (z := n) @[simp, norm_cast] theorem natCast_modEq_natCast {a b n : ℕ} : a ≡ b [PMOD (n : α)] ↔ a ≡ b [MOD n] := by	simp_rw [← Int.natCast_modEq_iff, ← modEq_iff_int_modEq, ← @intCast_modEq_intCast α, Int.cast_natCast]	Mathlib/Algebra/ModEq.lean	266	267
/- Copyright (c) 2022 Moritz Doll. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Moritz Doll -/ import Mathlib.Analysis.LocallyConvex.Basic /-! # Balanced Core and Balanced Hull ## Main definitions * `balancedCore`: The largest balanced subset of a set `s`. * `balancedHull`: The smallest balanced superset of a set `s`. ## Main statements * `balancedCore_eq_iInter`: Characterization of the balanced core as an intersection over subsets. * `nhds_basis_closed_balanced`: The closed balanced sets form a basis of the neighborhood filter. ## Implementation details The balanced core and hull are implemented differently: for the core we take the obvious definition of the union over all balanced sets that are contained in `s`, whereas for the hull, we take the union over `r • s`, for `r` the scalars with `‖r‖ ≤ 1`. We show that `balancedHull` has the defining properties of a hull in `Balanced.balancedHull_subset_of_subset` and `subset_balancedHull`. For the core we need slightly stronger assumptions to obtain a characterization as an intersection, this is `balancedCore_eq_iInter`. ## References * [Bourbaki, Topological Vector Spaces][bourbaki1987] ## Tags balanced -/ open Set Pointwise Topology Filter variable {𝕜 E ι : Type} section balancedHull section SeminormedRing variable [SeminormedRing 𝕜] section SMul variable (𝕜) [SMul 𝕜 E] {s t : Set E} {x : E} /-- The largest balanced subset of `s`. -/ def balancedCore (s : Set E) := ⋃₀ { t : Set E \| Balanced 𝕜 t ∧ t ⊆ s } /-- Helper definition to prove `balanced_core_eq_iInter` -/ def balancedCoreAux (s : Set E) := ⋂ (r : 𝕜) (_ : 1 ≤ ‖r‖), r • s /-- The smallest balanced superset of `s`. -/ def balancedHull (s : Set E) := ⋃ (r : 𝕜) (_ : ‖r‖ ≤ 1), r • s variable {𝕜} theorem balancedCore_subset (s : Set E) : balancedCore 𝕜 s ⊆ s := sUnion_subset fun _ ht => ht.2 theorem balancedCore_empty : balancedCore 𝕜 (∅ : Set E) = ∅ := eq_empty_of_subset_empty (balancedCore_subset _) theorem mem_balancedCore_iff : x ∈ balancedCore 𝕜 s ↔ ∃ t, Balanced 𝕜 t ∧ t ⊆ s ∧ x ∈ t := by simp_rw [balancedCore, mem_sUnion, mem_setOf_eq, and_assoc] theorem smul_balancedCore_subset (s : Set E) {a : 𝕜} (ha : ‖a‖ ≤ 1) : a • balancedCore 𝕜 s ⊆ balancedCore 𝕜 s := by rintro x ⟨y, hy, rfl⟩ rw [mem_balancedCore_iff] at hy rcases hy with ⟨t, ht1, ht2, hy⟩ exact ⟨t, ⟨ht1, ht2⟩, ht1 a ha (smul_mem_smul_set hy)⟩ theorem balancedCore_balanced (s : Set E) : Balanced 𝕜 (balancedCore 𝕜 s) := fun _ => smul_balancedCore_subset s /-- The balanced core of `t` is maximal in the sense that it contains any balanced subset `s` of `t`. -/ theorem Balanced.subset_balancedCore_of_subset (hs : Balanced 𝕜 s) (h : s ⊆ t) : s ⊆ balancedCore 𝕜 t := subset_sUnion_of_mem ⟨hs, h⟩ lemma Balanced.balancedCore_eq (h : Balanced 𝕜 s) : balancedCore 𝕜 s = s := le_antisymm (balancedCore_subset _) (h.subset_balancedCore_of_subset (subset_refl _)) theorem mem_balancedCoreAux_iff : x ∈ balancedCoreAux 𝕜 s ↔ ∀ r : 𝕜, 1 ≤ ‖r‖ → x ∈ r • s := mem_iInter₂ theorem mem_balancedHull_iff : x ∈ balancedHull 𝕜 s ↔ ∃ r : 𝕜, ‖r‖ ≤ 1 ∧ x ∈ r • s := by simp [balancedHull] /-- The balanced hull of `s` is minimal in the sense that it is contained in any balanced superset `t` of `s`. -/ theorem Balanced.balancedHull_subset_of_subset (ht : Balanced 𝕜 t) (h : s ⊆ t) : balancedHull 𝕜 s ⊆ t := by intros x hx obtain ⟨r, hr, y, hy, rfl⟩ := mem_balancedHull_iff.1 hx exact ht.smul_mem hr (h hy) @[mono, gcongr] theorem balancedHull_mono (hst : s ⊆ t) : balancedHull 𝕜 s ⊆ balancedHull 𝕜 t := by intro x hx rw [mem_balancedHull_iff] at obtain ⟨r, hr₁, hr₂⟩ := hx use r exact ⟨hr₁, smul_set_mono hst hr₂⟩ end SMul section Module variable [AddCommGroup E] [Module 𝕜 E] {s : Set E} theorem balancedCore_zero_mem (hs : (0 : E) ∈ s) : (0 : E) ∈ balancedCore 𝕜 s := mem_balancedCore_iff.2 ⟨0, balanced_zero, zero_subset.2 hs, Set.zero_mem_zero⟩ theorem balancedCore_nonempty_iff : (balancedCore 𝕜 s).Nonempty ↔ (0 : E) ∈ s := ⟨fun h => zero_subset.1 <\| (zero_smul_set h).superset.trans <\| (balancedCore_balanced s (0 : 𝕜) <\| norm_zero.trans_le zero_le_one).trans <\| balancedCore_subset _, fun h => ⟨0, balancedCore_zero_mem h⟩⟩ lemma Balanced.zero_mem (hs : Balanced 𝕜 s) (hs_nonempty : s.Nonempty) : (0 : E) ∈ s := by rw [← hs.balancedCore_eq] at hs_nonempty exact balancedCore_nonempty_iff.mp hs_nonempty variable (𝕜) in theorem subset_balancedHull [NormOneClass 𝕜] {s : Set E} : s ⊆ balancedHull 𝕜 s := fun _ hx => mem_balancedHull_iff.2 ⟨1, norm_one.le, _, hx, one_smul _ _⟩ theorem balancedHull.balanced (s : Set E) : Balanced 𝕜 (balancedHull 𝕜 s) := by intro a ha simp_rw [balancedHull, smul_set_iUnion₂, subset_def, mem_iUnion₂] rintro x ⟨r, hr, hx⟩ rw [← smul_assoc] at hx exact ⟨a • r, (norm_mul_le _ _).trans (mul_le_one₀ ha (norm_nonneg r) hr), hx⟩ open Balanced in theorem balancedHull_add_subset [NormOneClass 𝕜] {t : Set E} : balancedHull 𝕜 (s + t) ⊆ balancedHull 𝕜 s + balancedHull 𝕜 t := balancedHull_subset_of_subset (add (balancedHull.balanced _) (balancedHull.balanced _)) (add_subset_add (subset_balancedHull _) (subset_balancedHull _)) end Module end SeminormedRing section NormedField variable [NormedDivisionRing 𝕜] [AddCommGroup E] [Module 𝕜 E] {s t : Set E} @[simp] theorem balancedCoreAux_empty : balancedCoreAux 𝕜 (∅ : Set E) = ∅ := by simp_rw [balancedCoreAux, iInter₂_eq_empty_iff, smul_set_empty] exact fun _ => ⟨1, norm_one.ge, not_mem_empty _⟩ theorem balancedCoreAux_subset (s : Set E) : balancedCoreAux 𝕜 s ⊆ s := fun x hx => by simpa only [one_smul] using mem_balancedCoreAux_iff.1 hx 1 norm_one.ge theorem balancedCoreAux_balanced (h0 : (0 : E) ∈ balancedCoreAux 𝕜 s) : Balanced 𝕜 (balancedCoreAux 𝕜 s) := by rintro a ha x ⟨y, hy, rfl⟩ obtain rfl \| h := eq_or_ne a 0 · simp_rw [zero_smul, h0] rw [mem_balancedCoreAux_iff] at hy ⊢ intro r hr have h'' : 1 ≤ ‖a⁻¹ • r‖ := by rw [norm_smul, norm_inv] exact one_le_mul_of_one_le_of_one_le ((one_le_inv₀ (norm_pos_iff.mpr h)).2 ha) hr have h' := hy (a⁻¹ • r) h'' rwa [smul_assoc, mem_inv_smul_set_iff₀ h] at h' theorem balancedCoreAux_maximal (h : t ⊆ s) (ht : Balanced 𝕜 t) : t ⊆ balancedCoreAux 𝕜 s := by refine fun x hx => mem_balancedCoreAux_iff.2 fun r hr => ?_ rw [mem_smul_set_iff_inv_smul_mem₀ (norm_pos_iff.mp <\| zero_lt_one.trans_le hr)] refine h (ht.smul_mem ?_ hx) rw [norm_inv] exact inv_le_one_of_one_le₀ hr theorem balancedCore_subset_balancedCoreAux : balancedCore 𝕜 s ⊆ balancedCoreAux 𝕜 s := balancedCoreAux_maximal (balancedCore_subset s) (balancedCore_balanced s) theorem balancedCore_eq_iInter (hs : (0 : E) ∈ s) : balancedCore 𝕜 s = ⋂ (r : 𝕜) (_ : 1 ≤ ‖r‖), r • s := by refine balancedCore_subset_balancedCoreAux.antisymm ?_ refine (balancedCoreAux_balanced ?_).subset_balancedCore_of_subset (balancedCoreAux_subset s) exact balancedCore_subset_balancedCoreAux (balancedCore_zero_mem hs) theorem subset_balancedCore (ht : (0 : E) ∈ t) (hst : ∀ a : 𝕜, ‖a‖ ≤ 1 → a • s ⊆ t) : s ⊆ balancedCore 𝕜 t := by rw [balancedCore_eq_iInter ht] refine subset_iInter₂ fun a ha ↦ ?_ rw [subset_smul_set_iff₀ (norm_pos_iff.mp <\| zero_lt_one.trans_le ha)] apply hst rw [norm_inv] exact inv_le_one_of_one_le₀ ha end NormedField end balancedHull /-! ### Topological properties -/ section Topology variable [NormedDivisionRing 𝕜] [AddCommGroup E] [Module 𝕜 E] [TopologicalSpace E] [ContinuousSMul 𝕜 E] {U : Set E} protected theorem IsClosed.balancedCore (hU : IsClosed U) : IsClosed (balancedCore 𝕜 U) := by by_cases h : (0 : E) ∈ U · rw [balancedCore_eq_iInter h] refine isClosed_iInter fun a => ?_ refine isClosed_iInter fun ha => ?_ have ha' := lt_of_lt_of_le zero_lt_one ha rw [norm_pos_iff] at ha' exact isClosedMap_smul_of_ne_zero ha' U hU · have : balancedCore 𝕜 U = ∅ := by contrapose! h exact balancedCore_nonempty_iff.mp h rw [this] exact isClosed_empty -- We don't have a `NontriviallyNormedDivisionRing`, so we use a `NeBot` assumption instead variable [NeBot (𝓝[≠] (0 : 𝕜))] theorem balancedCore_mem_nhds_zero (hU : U ∈ 𝓝 (0 : E)) : balancedCore 𝕜 U ∈ 𝓝 (0 : E) := by -- Getting neighborhoods of the origin for `0 : 𝕜` and `0 : E` obtain ⟨r, V, hr, hV, hrVU⟩ : ∃ (r : ℝ) (V : Set E), 0 < r ∧ V ∈ 𝓝 (0 : E) ∧ ∀ (c : 𝕜) (y : E), ‖c‖ < r → y ∈ V → c • y ∈ U := by have h : Filter.Tendsto (fun x : 𝕜 × E => x.fst • x.snd) (𝓝 (0, 0)) (𝓝 0) :=	continuous_smul.tendsto' (0, 0) _ (smul_zero _) simpa only [← Prod.exists', ← Prod.forall', ← and_imp, ← and_assoc, exists_prop] using h.basis_left (NormedAddCommGroup.nhds_zero_basis_norm_lt.prod_nhds (𝓝 _).basis_sets) U hU obtain ⟨y, hyr, hy₀⟩ : ∃ y : 𝕜, ‖y‖ < r ∧ y ≠ 0 := Filter.nonempty_of_mem <\| (nhdsWithin_hasBasis NormedAddCommGroup.nhds_zero_basis_norm_lt {0}ᶜ).mem_of_mem hr have : y • V ∈ 𝓝 (0 : E) := (set_smul_mem_nhds_zero_iff hy₀).mpr hV -- It remains to show that `y • V ⊆ balancedCore 𝕜 U` refine Filter.mem_of_superset this (subset_balancedCore (mem_of_mem_nhds hU) fun a ha => ?_) rw [smul_smul] rintro _ ⟨z, hz, rfl⟩ refine hrVU _ _ ?_ hz rw [norm_mul, ← one_mul r] exact mul_lt_mul' ha hyr (norm_nonneg y) one_pos variable (𝕜 E) theorem nhds_basis_balanced :	Mathlib/Analysis/LocallyConvex/BalancedCoreHull.lean	242	259
/- Copyright (c) 2023 Kevin Buzzard. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kevin Buzzard, Yaël Dillies, Jineon Baek -/ import Mathlib.Algebra.EuclideanDomain.Int import Mathlib.Algebra.GCDMonoid.Finset import Mathlib.Algebra.GCDMonoid.Nat import Mathlib.Algebra.Order.Ring.Abs import Mathlib.RingTheory.PrincipalIdealDomain /-! # Statement of Fermat's Last Theorem This file states Fermat's Last Theorem. We provide a statement over a general semiring with specific exponent, along with the usual statement over the naturals. ## Main definitions * `FermatLastTheoremWith R n`: The statement that only solutions to the Fermat equation `a^n + b^n = c^n` in the semiring `R` have `a = 0`, `b = 0` or `c = 0`. Note that this statement can certainly be false for certain values of `R` and `n`. For example `FermatLastTheoremWith ℝ 3` is false as `1^3 + 1^3 = (2^{1/3})^3`, and `FermatLastTheoremWith ℕ 2` is false, as 3^2 + 4^2 = 5^2. * `FermatLastTheoremFor n` : The statement that the only solutions to `a^n + b^n = c^n` in `ℕ` have `a = 0`, `b = 0` or `c = 0`. Again, this statement is not always true, for example `FermatLastTheoremFor 1` is false because `2^1 + 2^1 = 4^1`. * `FermatLastTheorem` : The statement of Fermat's Last Theorem, namely that the only solutions to `a^n + b^n = c^n` in `ℕ` when `n ≥ 3` have `a = 0`, `b = 0` or `c = 0`. ## History	Fermat's Last Theorem was an open problem in number theory for hundreds of years, until it was finally solved by Andrew Wiles, assisted by Richard Taylor, in 1994 (see	Mathlib/NumberTheory/FLT/Basic.lean	36	37
/- Copyright (c) 2019 Anne Baanen. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Anne Baanen, Lu-Ming Zhang -/ import Mathlib.Data.Matrix.Invertible import Mathlib.Data.Matrix.Kronecker import Mathlib.LinearAlgebra.FiniteDimensional.Basic import Mathlib.LinearAlgebra.Matrix.Adjugate import Mathlib.LinearAlgebra.Matrix.SemiringInverse import Mathlib.LinearAlgebra.Matrix.ToLin import Mathlib.LinearAlgebra.Matrix.Trace /-! # Nonsingular inverses In this file, we define an inverse for square matrices of invertible determinant. For matrices that are not square or not of full rank, there is a more general notion of pseudoinverses which we do not consider here. The definition of inverse used in this file is the adjugate divided by the determinant. We show that dividing the adjugate by `det A` (if possible), giving a matrix `A⁻¹` (`nonsing_inv`), will result in a multiplicative inverse to `A`. Note that there are at least three different inverses in mathlib: * `A⁻¹` (`Inv.inv`): alone, this satisfies no properties, although it is usually used in conjunction with `Group` or `GroupWithZero`. On matrices, this is defined to be zero when no inverse exists. * `⅟A` (`invOf`): this is only available in the presence of `[Invertible A]`, which guarantees an inverse exists. * `Ring.inverse A`: this is defined on any `MonoidWithZero`, and just like `⁻¹` on matrices, is defined to be zero when no inverse exists. We start by working with `Invertible`, and show the main results: * `Matrix.invertibleOfDetInvertible` * `Matrix.detInvertibleOfInvertible` * `Matrix.isUnit_iff_isUnit_det` * `Matrix.mul_eq_one_comm` After this we define `Matrix.inv` and show it matches `⅟A` and `Ring.inverse A`. The rest of the results in the file are then about `A⁻¹` ## References * https://en.wikipedia.org/wiki/Cramer's_rule#Finding_inverse_matrix ## Tags matrix inverse, cramer, cramer's rule, adjugate -/ namespace Matrix universe u u' v variable {l : Type} {m : Type u} {n : Type u'} {α : Type v} open Matrix Equiv Equiv.Perm Finset /-! ### Matrices are `Invertible` iff their determinants are -/ section Invertible variable [Fintype n] [DecidableEq n] [CommRing α] variable (A : Matrix n n α) (B : Matrix n n α) /-- If `A.det` has a constructive inverse, produce one for `A`. -/ def invertibleOfDetInvertible [Invertible A.det] : Invertible A where invOf := ⅟ A.det • A.adjugate mul_invOf_self := by rw [mul_smul_comm, mul_adjugate, smul_smul, invOf_mul_self, one_smul] invOf_mul_self := by rw [smul_mul_assoc, adjugate_mul, smul_smul, invOf_mul_self, one_smul] theorem invOf_eq [Invertible A.det] [Invertible A] : ⅟ A = ⅟ A.det • A.adjugate := by letI := invertibleOfDetInvertible A convert (rfl : ⅟ A = _) /-- `A.det` is invertible if `A` has a left inverse. -/ def detInvertibleOfLeftInverse (h : B A = 1) : Invertible A.det where invOf := B.det mul_invOf_self := by rw [mul_comm, ← det_mul, h, det_one] invOf_mul_self := by rw [← det_mul, h, det_one] /-- `A.det` is invertible if `A` has a right inverse. -/ def detInvertibleOfRightInverse (h : A * B = 1) : Invertible A.det where invOf := B.det mul_invOf_self := by rw [← det_mul, h, det_one] invOf_mul_self := by rw [mul_comm, ← det_mul, h, det_one] /-- If `A` has a constructive inverse, produce one for `A.det`. -/ def detInvertibleOfInvertible [Invertible A] : Invertible A.det := detInvertibleOfLeftInverse A (⅟ A) (invOf_mul_self _) theorem det_invOf [Invertible A] [Invertible A.det] : (⅟ A).det = ⅟ A.det := by letI := detInvertibleOfInvertible A convert (rfl : _ = ⅟ A.det) /-- Together `Matrix.detInvertibleOfInvertible` and `Matrix.invertibleOfDetInvertible` form an equivalence, although both sides of the equiv are subsingleton anyway. -/ @[simps] def invertibleEquivDetInvertible : Invertible A ≃ Invertible A.det where toFun := @detInvertibleOfInvertible _ _ _ _ _ A invFun := @invertibleOfDetInvertible _ _ _ _ _ A left_inv _ := Subsingleton.elim _ _ right_inv _ := Subsingleton.elim _ _ /-- Given a proof that `A.det` has a constructive inverse, lift `A` to `(Matrix n n α)ˣ` -/ def unitOfDetInvertible [Invertible A.det] : (Matrix n n α)ˣ := @unitOfInvertible _ _ A (invertibleOfDetInvertible A) /-- When lowered to a prop, `Matrix.invertibleEquivDetInvertible` forms an `iff`. -/ theorem isUnit_iff_isUnit_det : IsUnit A ↔ IsUnit A.det := by simp only [← nonempty_invertible_iff_isUnit, (invertibleEquivDetInvertible A).nonempty_congr] @[simp] theorem isUnits_det_units (A : (Matrix n n α)ˣ) : IsUnit (A : Matrix n n α).det := isUnit_iff_isUnit_det _ \|>.mp A.isUnit /-! #### Variants of the statements above with `IsUnit` -/ theorem isUnit_det_of_invertible [Invertible A] : IsUnit A.det := @isUnit_of_invertible _ _ _ (detInvertibleOfInvertible A) variable {A B} theorem isUnit_det_of_left_inverse (h : B * A = 1) : IsUnit A.det := @isUnit_of_invertible _ _ _ (detInvertibleOfLeftInverse _ _ h) theorem isUnit_det_of_right_inverse (h : A * B = 1) : IsUnit A.det := @isUnit_of_invertible _ _ _ (detInvertibleOfRightInverse _ _ h) theorem det_ne_zero_of_left_inverse [Nontrivial α] (h : B * A = 1) : A.det ≠ 0 := (isUnit_det_of_left_inverse h).ne_zero theorem det_ne_zero_of_right_inverse [Nontrivial α] (h : A * B = 1) : A.det ≠ 0 := (isUnit_det_of_right_inverse h).ne_zero end Invertible section Inv variable [Fintype n] [DecidableEq n] [CommRing α] variable (A : Matrix n n α) (B : Matrix n n α) theorem isUnit_det_transpose (h : IsUnit A.det) : IsUnit Aᵀ.det := by rw [det_transpose] exact h /-! ### A noncomputable `Inv` instance -/ /-- The inverse of a square matrix, when it is invertible (and zero otherwise). -/ noncomputable instance inv : Inv (Matrix n n α) := ⟨fun A => Ring.inverse A.det • A.adjugate⟩ theorem inv_def (A : Matrix n n α) : A⁻¹ = Ring.inverse A.det • A.adjugate := rfl theorem nonsing_inv_apply_not_isUnit (h : ¬IsUnit A.det) : A⁻¹ = 0 := by rw [inv_def, Ring.inverse_non_unit _ h, zero_smul] theorem nonsing_inv_apply (h : IsUnit A.det) : A⁻¹ = (↑h.unit⁻¹ : α) • A.adjugate := by rw [inv_def, ← Ring.inverse_unit h.unit, IsUnit.unit_spec] /-- The nonsingular inverse is the same as `invOf` when `A` is invertible. -/ @[simp] theorem invOf_eq_nonsing_inv [Invertible A] : ⅟ A = A⁻¹ := by letI := detInvertibleOfInvertible A rw [inv_def, Ring.inverse_invertible, invOf_eq] /-- Coercing the result of `Units.instInv` is the same as coercing first and applying the nonsingular inverse. -/ @[simp, norm_cast] theorem coe_units_inv (A : (Matrix n n α)ˣ) : ↑A⁻¹ = (A⁻¹ : Matrix n n α) := by letI := A.invertible rw [← invOf_eq_nonsing_inv, invOf_units] /-- The nonsingular inverse is the same as the general `Ring.inverse`. -/ theorem nonsing_inv_eq_ringInverse : A⁻¹ = Ring.inverse A := by by_cases h_det : IsUnit A.det · cases (A.isUnit_iff_isUnit_det.mpr h_det).nonempty_invertible rw [← invOf_eq_nonsing_inv, Ring.inverse_invertible] · have h := mt A.isUnit_iff_isUnit_det.mp h_det rw [Ring.inverse_non_unit _ h, nonsing_inv_apply_not_isUnit A h_det] @[deprecated (since := "2025-04-22")] alias nonsing_inv_eq_ring_inverse := nonsing_inv_eq_ringInverse theorem transpose_nonsing_inv : A⁻¹ᵀ = Aᵀ⁻¹ := by rw [inv_def, inv_def, transpose_smul, det_transpose, adjugate_transpose] theorem conjTranspose_nonsing_inv [StarRing α] : A⁻¹ᴴ = Aᴴ⁻¹ := by rw [inv_def, inv_def, conjTranspose_smul, det_conjTranspose, adjugate_conjTranspose, Ring.inverse_star] /-- The `nonsing_inv` of `A` is a right inverse. -/ @[simp] theorem mul_nonsing_inv (h : IsUnit A.det) : A * A⁻¹ = 1 := by cases (A.isUnit_iff_isUnit_det.mpr h).nonempty_invertible rw [← invOf_eq_nonsing_inv, mul_invOf_self] /-- The `nonsing_inv` of `A` is a left inverse. -/ @[simp] theorem nonsing_inv_mul (h : IsUnit A.det) : A⁻¹ * A = 1 := by cases (A.isUnit_iff_isUnit_det.mpr h).nonempty_invertible rw [← invOf_eq_nonsing_inv, invOf_mul_self] instance [Invertible A] : Invertible A⁻¹ := by rw [← invOf_eq_nonsing_inv] infer_instance @[simp] theorem inv_inv_of_invertible [Invertible A] : A⁻¹⁻¹ = A := by simp only [← invOf_eq_nonsing_inv, invOf_invOf] @[simp] theorem mul_nonsing_inv_cancel_right (B : Matrix m n α) (h : IsUnit A.det) : B * A * A⁻¹ = B := by simp [Matrix.mul_assoc, mul_nonsing_inv A h] @[simp] theorem mul_nonsing_inv_cancel_left (B : Matrix n m α) (h : IsUnit A.det) : A * (A⁻¹ * B) = B := by simp [← Matrix.mul_assoc, mul_nonsing_inv A h] @[simp] theorem nonsing_inv_mul_cancel_right (B : Matrix m n α) (h : IsUnit A.det) : B * A⁻¹ * A = B := by simp [Matrix.mul_assoc, nonsing_inv_mul A h] @[simp] theorem nonsing_inv_mul_cancel_left (B : Matrix n m α) (h : IsUnit A.det) : A⁻¹ * (A * B) = B := by simp [← Matrix.mul_assoc, nonsing_inv_mul A h] @[simp] theorem mul_inv_of_invertible [Invertible A] : A * A⁻¹ = 1 := mul_nonsing_inv A (isUnit_det_of_invertible A) @[simp] theorem inv_mul_of_invertible [Invertible A] : A⁻¹ * A = 1 := nonsing_inv_mul A (isUnit_det_of_invertible A) @[simp] theorem mul_inv_cancel_right_of_invertible (B : Matrix m n α) [Invertible A] : B * A * A⁻¹ = B := mul_nonsing_inv_cancel_right A B (isUnit_det_of_invertible A) @[simp] theorem mul_inv_cancel_left_of_invertible (B : Matrix n m α) [Invertible A] : A * (A⁻¹ * B) = B := mul_nonsing_inv_cancel_left A B (isUnit_det_of_invertible A) @[simp] theorem inv_mul_cancel_right_of_invertible (B : Matrix m n α) [Invertible A] : B * A⁻¹ * A = B := nonsing_inv_mul_cancel_right A B (isUnit_det_of_invertible A) @[simp] theorem inv_mul_cancel_left_of_invertible (B : Matrix n m α) [Invertible A] : A⁻¹ * (A * B) = B := nonsing_inv_mul_cancel_left A B (isUnit_det_of_invertible A) theorem inv_mul_eq_iff_eq_mul_of_invertible (A B C : Matrix n n α) [Invertible A] : A⁻¹ * B = C ↔ B = A * C := ⟨fun h => by rw [← h, mul_inv_cancel_left_of_invertible], fun h => by rw [h, inv_mul_cancel_left_of_invertible]⟩ theorem mul_inv_eq_iff_eq_mul_of_invertible (A B C : Matrix n n α) [Invertible A] : B * A⁻¹ = C ↔ B = C * A := ⟨fun h => by rw [← h, inv_mul_cancel_right_of_invertible], fun h => by rw [h, mul_inv_cancel_right_of_invertible]⟩ lemma inv_mulVec_eq_vec {A : Matrix n n α} [Invertible A] {u v : n → α} (hM : u = A.mulVec v) : A⁻¹.mulVec u = v := by rw [hM, Matrix.mulVec_mulVec, Matrix.inv_mul_of_invertible, Matrix.one_mulVec] lemma mul_right_injective_of_invertible [Invertible A] : Function.Injective (fun (x : Matrix n m α) => A * x) := fun _ _ h => by simpa only [inv_mul_cancel_left_of_invertible] using congr_arg (A⁻¹ * ·) h lemma mul_left_injective_of_invertible [Invertible A] : Function.Injective (fun (x : Matrix m n α) => x * A) := fun a x hax => by simpa only [mul_inv_cancel_right_of_invertible] using congr_arg (· * A⁻¹) hax lemma mul_right_inj_of_invertible [Invertible A] {x y : Matrix n m α} : A * x = A * y ↔ x = y := (mul_right_injective_of_invertible A).eq_iff lemma mul_left_inj_of_invertible [Invertible A] {x y : Matrix m n α} : x * A = y * A ↔ x = y := (mul_left_injective_of_invertible A).eq_iff end Inv section InjectiveMul variable [Fintype n] [Fintype m] [DecidableEq m] [CommRing α] lemma mul_left_injective_of_inv (A : Matrix m n α) (B : Matrix n m α) (h : A * B = 1) : Function.Injective (fun x : Matrix l m α => x * A) := fun _ _ g => by simpa only [Matrix.mul_assoc, Matrix.mul_one, h] using congr_arg (· * B) g lemma mul_right_injective_of_inv (A : Matrix m n α) (B : Matrix n m α) (h : A * B = 1) : Function.Injective (fun x : Matrix m l α => B * x) := fun _ _ g => by simpa only [← Matrix.mul_assoc, Matrix.one_mul, h] using congr_arg (A * ·) g end InjectiveMul section vecMul section Semiring variable {R : Type} [Semiring R] theorem vecMul_surjective_iff_exists_left_inverse [DecidableEq n] [Fintype m] [Finite n] {A : Matrix m n R} : Function.Surjective A.vecMul ↔ ∃ B : Matrix n m R, B A = 1 := by cases nonempty_fintype n refine ⟨fun h ↦ ?_, fun ⟨B, hBA⟩ y ↦ ⟨y ᵥ* B, by simp [hBA]⟩⟩ choose rows hrows using (h <\| Pi.single · 1) refine ⟨Matrix.of rows, Matrix.ext fun i j => ?_⟩ rw [mul_apply_eq_vecMul, one_eq_pi_single, ← hrows] rfl theorem mulVec_surjective_iff_exists_right_inverse [DecidableEq m] [Finite m] [Fintype n] {A : Matrix m n R} : Function.Surjective A.mulVec ↔ ∃ B : Matrix n m R, A * B = 1 := by cases nonempty_fintype m refine ⟨fun h ↦ ?_, fun ⟨B, hBA⟩ y ↦ ⟨B ᵥ y, by simp [hBA]⟩⟩ choose cols hcols using (h <\| Pi.single · 1) refine ⟨(Matrix.of cols)ᵀ, Matrix.ext fun i j ↦ ?_⟩ rw [one_eq_pi_single, Pi.single_comm, ← hcols j] rfl end Semiring variable [DecidableEq m] {R K : Type} [CommRing R] [Field K] [Fintype m] theorem vecMul_surjective_iff_isUnit {A : Matrix m m R} : Function.Surjective A.vecMul ↔ IsUnit A := by rw [vecMul_surjective_iff_exists_left_inverse, exists_left_inverse_iff_isUnit] theorem mulVec_surjective_iff_isUnit {A : Matrix m m R} : Function.Surjective A.mulVec ↔ IsUnit A := by rw [mulVec_surjective_iff_exists_right_inverse, exists_right_inverse_iff_isUnit] theorem vecMul_injective_iff_isUnit {A : Matrix m m K} : Function.Injective A.vecMul ↔ IsUnit A := by refine ⟨fun h ↦ ?_, fun h ↦ ?_⟩ · rw [← vecMul_surjective_iff_isUnit] exact LinearMap.surjective_of_injective (f := A.vecMulLinear) h change Function.Injective A.vecMulLinear rw [← LinearMap.ker_eq_bot, LinearMap.ker_eq_bot'] intro c hc replace h := h.invertible simpa using congr_arg A⁻¹.vecMulLinear hc theorem mulVec_injective_iff_isUnit {A : Matrix m m K} : Function.Injective A.mulVec ↔ IsUnit A := by rw [← isUnit_transpose, ← vecMul_injective_iff_isUnit] simp_rw [vecMul_transpose] theorem linearIndependent_rows_iff_isUnit {A : Matrix m m K} : LinearIndependent K A.row ↔ IsUnit A := by rw [← col_transpose, ← mulVec_injective_iff, ← coe_mulVecLin, mulVecLin_transpose, ← vecMul_injective_iff_isUnit, coe_vecMulLinear] theorem linearIndependent_cols_iff_isUnit {A : Matrix m m K} : LinearIndependent K A.col ↔ IsUnit A := by rw [← row_transpose, linearIndependent_rows_iff_isUnit, isUnit_transpose] theorem vecMul_surjective_of_invertible (A : Matrix m m R) [Invertible A] : Function.Surjective A.vecMul := vecMul_surjective_iff_isUnit.2 <\| isUnit_of_invertible A theorem mulVec_surjective_of_invertible (A : Matrix m m R) [Invertible A] : Function.Surjective A.mulVec := mulVec_surjective_iff_isUnit.2 <\| isUnit_of_invertible A theorem vecMul_injective_of_invertible (A : Matrix m m K) [Invertible A] : Function.Injective A.vecMul := vecMul_injective_iff_isUnit.2 <\| isUnit_of_invertible A theorem mulVec_injective_of_invertible (A : Matrix m m K) [Invertible A] : Function.Injective A.mulVec := mulVec_injective_iff_isUnit.2 <\| isUnit_of_invertible A theorem linearIndependent_rows_of_invertible (A : Matrix m m K) [Invertible A] : LinearIndependent K A.row := linearIndependent_rows_iff_isUnit.2 <\| isUnit_of_invertible A theorem linearIndependent_cols_of_invertible (A : Matrix m m K) [Invertible A] : LinearIndependent K A.col := linearIndependent_cols_iff_isUnit.2 <\| isUnit_of_invertible A end vecMul variable [Fintype n] [DecidableEq n] [CommRing α] variable (A : Matrix n n α) (B : Matrix n n α) theorem nonsing_inv_cancel_or_zero : A⁻¹ * A = 1 ∧ A * A⁻¹ = 1 ∨ A⁻¹ = 0 := by by_cases h : IsUnit A.det · exact Or.inl ⟨nonsing_inv_mul _ h, mul_nonsing_inv _ h⟩ · exact Or.inr (nonsing_inv_apply_not_isUnit _ h) theorem det_nonsing_inv_mul_det (h : IsUnit A.det) : A⁻¹.det * A.det = 1 := by rw [← det_mul, A.nonsing_inv_mul h, det_one] @[simp] theorem det_nonsing_inv : A⁻¹.det = Ring.inverse A.det := by by_cases h : IsUnit A.det · cases h.nonempty_invertible letI := invertibleOfDetInvertible A rw [Ring.inverse_invertible, ← invOf_eq_nonsing_inv, det_invOf] cases isEmpty_or_nonempty n · rw [det_isEmpty, det_isEmpty, Ring.inverse_one] · rw [Ring.inverse_non_unit _ h, nonsing_inv_apply_not_isUnit _ h, det_zero ‹_›] theorem isUnit_nonsing_inv_det (h : IsUnit A.det) : IsUnit A⁻¹.det := isUnit_of_mul_eq_one _ _ (A.det_nonsing_inv_mul_det h) @[simp] theorem nonsing_inv_nonsing_inv (h : IsUnit A.det) : A⁻¹⁻¹ = A := calc A⁻¹⁻¹ = 1 * A⁻¹⁻¹ := by rw [Matrix.one_mul] _ = A * A⁻¹ * A⁻¹⁻¹ := by rw [A.mul_nonsing_inv h] _ = A := by rw [Matrix.mul_assoc, A⁻¹.mul_nonsing_inv (A.isUnit_nonsing_inv_det h), Matrix.mul_one] theorem isUnit_nonsing_inv_det_iff {A : Matrix n n α} : IsUnit A⁻¹.det ↔ IsUnit A.det := by rw [Matrix.det_nonsing_inv, isUnit_ringInverse] @[simp] theorem isUnit_nonsing_inv_iff {A : Matrix n n α} : IsUnit A⁻¹ ↔ IsUnit A := by simp_rw [isUnit_iff_isUnit_det, isUnit_nonsing_inv_det_iff] -- `IsUnit.invertible` lifts the proposition `IsUnit A` to a constructive inverse of `A`. /-- A version of `Matrix.invertibleOfDetInvertible` with the inverse defeq to `A⁻¹` that is therefore noncomputable. -/ noncomputable def invertibleOfIsUnitDet (h : IsUnit A.det) : Invertible A := ⟨A⁻¹, nonsing_inv_mul A h, mul_nonsing_inv A h⟩ /-- A version of `Matrix.unitOfDetInvertible` with the inverse defeq to `A⁻¹` that is therefore noncomputable. -/ noncomputable def nonsingInvUnit (h : IsUnit A.det) : (Matrix n n α)ˣ := @unitOfInvertible _ _ _ (invertibleOfIsUnitDet A h) theorem unitOfDetInvertible_eq_nonsingInvUnit [Invertible A.det] : unitOfDetInvertible A = nonsingInvUnit A (isUnit_of_invertible _) := by ext rfl variable {A} {B} /-- If matrix A is left invertible, then its inverse equals its left inverse. -/ theorem inv_eq_left_inv (h : B * A = 1) : A⁻¹ = B := letI := invertibleOfLeftInverse _ _ h invOf_eq_nonsing_inv A ▸ invOf_eq_left_inv h /-- If matrix A is right invertible, then its inverse equals its right inverse. -/ theorem inv_eq_right_inv (h : A * B = 1) : A⁻¹ = B := inv_eq_left_inv (mul_eq_one_comm.2 h) section InvEqInv variable {C : Matrix n n α} /-- The left inverse of matrix A is unique when existing. -/ theorem left_inv_eq_left_inv (h : B * A = 1) (g : C * A = 1) : B = C := by rw [← inv_eq_left_inv h, ← inv_eq_left_inv g] /-- The right inverse of matrix A is unique when existing. -/ theorem right_inv_eq_right_inv (h : A * B = 1) (g : A * C = 1) : B = C := by rw [← inv_eq_right_inv h, ← inv_eq_right_inv g] /-- The right inverse of matrix A equals the left inverse of A when they exist. -/ theorem right_inv_eq_left_inv (h : A * B = 1) (g : C * A = 1) : B = C := by rw [← inv_eq_right_inv h, ← inv_eq_left_inv g] theorem inv_inj (h : A⁻¹ = B⁻¹) (h' : IsUnit A.det) : A = B := by refine left_inv_eq_left_inv (mul_nonsing_inv _ h') ?_ rw [h] refine mul_nonsing_inv _ ?_ rwa [← isUnit_nonsing_inv_det_iff, ← h, isUnit_nonsing_inv_det_iff] end InvEqInv variable (A) @[simp] theorem inv_zero : (0 : Matrix n n α)⁻¹ = 0 := by rcases subsingleton_or_nontrivial α with ht \| ht · simp [eq_iff_true_of_subsingleton] rcases (Fintype.card n).zero_le.eq_or_lt with hc \| hc · rw [eq_comm, Fintype.card_eq_zero_iff] at hc haveI := hc ext i exact (IsEmpty.false i).elim · have hn : Nonempty n := Fintype.card_pos_iff.mp hc refine nonsing_inv_apply_not_isUnit _ ?_ simp [hn] noncomputable instance : InvOneClass (Matrix n n α) := { Matrix.one, Matrix.inv with inv_one := inv_eq_left_inv (by simp) } theorem inv_smul (k : α) [Invertible k] (h : IsUnit A.det) : (k • A)⁻¹ = ⅟ k • A⁻¹ := inv_eq_left_inv (by simp [h, smul_smul]) theorem inv_smul' (k : αˣ) (h : IsUnit A.det) : (k • A)⁻¹ = k⁻¹ • A⁻¹ := inv_eq_left_inv (by simp [h, smul_smul]) theorem inv_adjugate (A : Matrix n n α) (h : IsUnit A.det) : (adjugate A)⁻¹ = h.unit⁻¹ • A := by refine inv_eq_left_inv ?_ rw [smul_mul, mul_adjugate, Units.smul_def, smul_smul, h.val_inv_mul, one_smul] section Diagonal /-- `diagonal v` is invertible if `v` is -/ def diagonalInvertible {α} [NonAssocSemiring α] (v : n → α) [Invertible v] : Invertible (diagonal v) := Invertible.map (diagonalRingHom n α) v theorem invOf_diagonal_eq {α} [Semiring α] (v : n → α) [Invertible v] [Invertible (diagonal v)] : ⅟ (diagonal v) = diagonal (⅟ v) := by rw [@Invertible.congr _ _ _ _ _ (diagonalInvertible v) rfl] rfl /-- `v` is invertible if `diagonal v` is -/ def invertibleOfDiagonalInvertible (v : n → α) [Invertible (diagonal v)] : Invertible v where invOf := diag (⅟ (diagonal v)) invOf_mul_self := funext fun i => by letI : Invertible (diagonal v).det := detInvertibleOfInvertible _ rw [invOf_eq, diag_smul, adjugate_diagonal, diag_diagonal] dsimp rw [mul_assoc, prod_erase_mul _ _ (Finset.mem_univ _), ← det_diagonal] exact mul_invOf_self _ mul_invOf_self := funext fun i => by letI : Invertible (diagonal v).det := detInvertibleOfInvertible _ rw [invOf_eq, diag_smul, adjugate_diagonal, diag_diagonal] dsimp rw [mul_left_comm, mul_prod_erase _ _ (Finset.mem_univ _), ← det_diagonal] exact mul_invOf_self _ /-- Together `Matrix.diagonalInvertible` and `Matrix.invertibleOfDiagonalInvertible` form an equivalence, although both sides of the equiv are subsingleton anyway. -/ @[simps] def diagonalInvertibleEquivInvertible (v : n → α) : Invertible (diagonal v) ≃ Invertible v where toFun := @invertibleOfDiagonalInvertible _ _ _ _ _ _ invFun := @diagonalInvertible _ _ _ _ _ _ left_inv _ := Subsingleton.elim _ _ right_inv _ := Subsingleton.elim _ _ /-- When lowered to a prop, `Matrix.diagonalInvertibleEquivInvertible` forms an `iff`. -/ @[simp] theorem isUnit_diagonal {v : n → α} : IsUnit (diagonal v) ↔ IsUnit v := by simp only [← nonempty_invertible_iff_isUnit, (diagonalInvertibleEquivInvertible v).nonempty_congr] theorem inv_diagonal (v : n → α) : (diagonal v)⁻¹ = diagonal (Ring.inverse v) := by rw [nonsing_inv_eq_ringInverse] by_cases h : IsUnit v · have := isUnit_diagonal.mpr h cases this.nonempty_invertible cases h.nonempty_invertible rw [Ring.inverse_invertible, Ring.inverse_invertible, invOf_diagonal_eq] · have := isUnit_diagonal.not.mpr h rw [Ring.inverse_non_unit _ h, Pi.zero_def, diagonal_zero, Ring.inverse_non_unit _ this] end Diagonal /-- The inverse of a 1×1 or 0×0 matrix is always diagonal. While we could write this as `of fun _ _ => Ring.inverse (A default default)` on the RHS, this is less useful because: * It wouldn't work for 0×0 matrices. * More things are true about diagonal matrices than constant matrices, and so more lemmas exist. `Matrix.diagonal_unique` can be used to reach this form, while `Ring.inverse_eq_inv` can be used to replace `Ring.inverse` with `⁻¹`. -/ @[simp] theorem inv_subsingleton [Subsingleton m] [Fintype m] [DecidableEq m] (A : Matrix m m α) : A⁻¹ = diagonal fun i => Ring.inverse (A i i) := by rw [inv_def, adjugate_subsingleton, smul_one_eq_diagonal] congr! with i exact det_eq_elem_of_subsingleton _ _ section Woodbury variable [Fintype m] [DecidableEq m] variable (A : Matrix n n α) (U : Matrix n m α) (C : Matrix m m α) (V : Matrix m n α) /-- The Woodbury Identity (`⁻¹` version). -/ theorem add_mul_mul_inv_eq_sub (hA : IsUnit A) (hC : IsUnit C) (hAC : IsUnit (C⁻¹ + V * A⁻¹ * U)) : (A + U * C * V)⁻¹ = A⁻¹ - A⁻¹ * U * (C⁻¹ + V * A⁻¹ * U)⁻¹ * V * A⁻¹ := by obtain ⟨_⟩ := hA.nonempty_invertible obtain ⟨_⟩ := hC.nonempty_invertible obtain ⟨iAC⟩ := hAC.nonempty_invertible simp only [← invOf_eq_nonsing_inv] at iAC letI := invertibleAddMulMul A U C V simp only [← invOf_eq_nonsing_inv] apply invOf_add_mul_mul end Woodbury @[simp] theorem inv_inv_inv (A : Matrix n n α) : A⁻¹⁻¹⁻¹ = A⁻¹ := by by_cases h : IsUnit A.det · rw [nonsing_inv_nonsing_inv _ h] · simp [nonsing_inv_apply_not_isUnit _ h] /-- The `Matrix` version of `inv_add_inv'` -/ theorem inv_add_inv {A B : Matrix n n α} (h : IsUnit A ↔ IsUnit B) : A⁻¹ + B⁻¹ = A⁻¹ * (A + B) * B⁻¹ := by simpa only [nonsing_inv_eq_ringInverse] using Ring.inverse_add_inverse h /-- The `Matrix` version of `inv_sub_inv'` -/ theorem inv_sub_inv {A B : Matrix n n α} (h : IsUnit A ↔ IsUnit B) : A⁻¹ - B⁻¹ = A⁻¹ * (B - A) * B⁻¹ := by simpa only [nonsing_inv_eq_ringInverse] using Ring.inverse_sub_inverse h theorem mul_inv_rev (A B : Matrix n n α) : (A * B)⁻¹ = B⁻¹ * A⁻¹ := by simp only [inv_def] rw [Matrix.smul_mul, Matrix.mul_smul, smul_smul, det_mul, adjugate_mul_distrib, Ring.mul_inverse_rev] /-- A version of `List.prod_inv_reverse` for `Matrix.inv`. -/ theorem list_prod_inv_reverse : ∀ l : List (Matrix n n α), l.prod⁻¹ = (l.reverse.map Inv.inv).prod \| [] => by rw [List.reverse_nil, List.map_nil, List.prod_nil, inv_one] \| A::Xs => by rw [List.reverse_cons', List.map_concat, List.prod_concat, List.prod_cons, mul_inv_rev, list_prod_inv_reverse Xs] /-- One form of Cramer's rule. See `Matrix.mulVec_cramer` for a stronger form. -/ @[simp] theorem det_smul_inv_mulVec_eq_cramer (A : Matrix n n α) (b : n → α) (h : IsUnit A.det) : A.det • A⁻¹ ᵥ b = cramer A b := by rw [cramer_eq_adjugate_mulVec, A.nonsing_inv_apply h, ← smul_mulVec_assoc, smul_smul, h.mul_val_inv, one_smul] /-- One form of Cramer's rule. See `Matrix.mulVec_cramer` for a stronger form. -/ @[simp] theorem det_smul_inv_vecMul_eq_cramer_transpose (A : Matrix n n α) (b : n → α) (h : IsUnit A.det) : A.det • b ᵥ A⁻¹ = cramer Aᵀ b := by rw [← A⁻¹.transpose_transpose, vecMul_transpose, transpose_nonsing_inv, ← det_transpose, Aᵀ.det_smul_inv_mulVec_eq_cramer _ (isUnit_det_transpose A h)] /-! ### Inverses of permutated matrices Note that the simp-normal form of `Matrix.reindex` is `Matrix.submatrix`, so we prove most of these results about only the latter. -/ section Submatrix variable [Fintype m] variable [DecidableEq m] /-- `A.submatrix e₁ e₂` is invertible if `A` is -/ def submatrixEquivInvertible (A : Matrix m m α) (e₁ e₂ : n ≃ m) [Invertible A] : Invertible (A.submatrix e₁ e₂) := invertibleOfRightInverse _ ((⅟ A).submatrix e₂ e₁) <\| by rw [Matrix.submatrix_mul_equiv, mul_invOf_self, submatrix_one_equiv] /-- `A` is invertible if `A.submatrix e₁ e₂` is -/ def invertibleOfSubmatrixEquivInvertible (A : Matrix m m α) (e₁ e₂ : n ≃ m) [Invertible (A.submatrix e₁ e₂)] : Invertible A := invertibleOfRightInverse _ ((⅟ (A.submatrix e₁ e₂)).submatrix e₂.symm e₁.symm) <\| by have : A = (A.submatrix e₁ e₂).submatrix e₁.symm e₂.symm := by simp conv in _ * _ => congr rw [this] rw [Matrix.submatrix_mul_equiv, mul_invOf_self, submatrix_one_equiv] theorem invOf_submatrix_equiv_eq (A : Matrix m m α) (e₁ e₂ : n ≃ m) [Invertible A] [Invertible (A.submatrix e₁ e₂)] : ⅟ (A.submatrix e₁ e₂) = (⅟ A).submatrix e₂ e₁ := by rw [@Invertible.congr _ _ _ _ _ (submatrixEquivInvertible A e₁ e₂) rfl] rfl /-- Together `Matrix.submatrixEquivInvertible` and `Matrix.invertibleOfSubmatrixEquivInvertible` form an equivalence, although both sides of the equiv are subsingleton anyway. -/ @[simps] def submatrixEquivInvertibleEquivInvertible (A : Matrix m m α) (e₁ e₂ : n ≃ m) : Invertible (A.submatrix e₁ e₂) ≃ Invertible A where toFun _ := invertibleOfSubmatrixEquivInvertible A e₁ e₂ invFun _ := submatrixEquivInvertible A e₁ e₂ left_inv _ := Subsingleton.elim _ _ right_inv _ := Subsingleton.elim _ _ /-- When lowered to a prop, `Matrix.invertibleOfSubmatrixEquivInvertible` forms an `iff`. -/ @[simp] theorem isUnit_submatrix_equiv {A : Matrix m m α} (e₁ e₂ : n ≃ m) : IsUnit (A.submatrix e₁ e₂) ↔ IsUnit A := by simp only [← nonempty_invertible_iff_isUnit, (submatrixEquivInvertibleEquivInvertible A _ _).nonempty_congr] @[simp] theorem inv_submatrix_equiv (A : Matrix m m α) (e₁ e₂ : n ≃ m) : (A.submatrix e₁ e₂)⁻¹ = A⁻¹.submatrix e₂ e₁ := by by_cases h : IsUnit A · cases h.nonempty_invertible letI := submatrixEquivInvertible A e₁ e₂ rw [← invOf_eq_nonsing_inv, ← invOf_eq_nonsing_inv, invOf_submatrix_equiv_eq A]	· have := (isUnit_submatrix_equiv e₁ e₂).not.mpr h simp_rw [nonsing_inv_eq_ringInverse, Ring.inverse_non_unit _ h, Ring.inverse_non_unit _ this, submatrix_zero, Pi.zero_apply]	Mathlib/LinearAlgebra/Matrix/NonsingularInverse.lean	706	709
/- 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 refine ⟨h'.dense_of_mapsTo f'.continuous hs.1 ?_, h.continuousWithinAt.mem_closure_image hs.2⟩ show Submodule.span 𝕜 (tangentConeAt 𝕜 s x) ≤ (Submodule.span 𝕜 (tangentConeAt 𝕜 (f '' s) (f x))).comap f' rw [Submodule.span_le] exact h.mapsTo_tangent_cone.mono Subset.rfl Submodule.subset_span theorem UniqueDiffOn.image {f' : E → E →L[𝕜] F} (hs : UniqueDiffOn 𝕜 s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hd : ∀ x ∈ s, DenseRange (f' x)) : UniqueDiffOn 𝕜 (f '' s) := forall_mem_image.2 fun x hx => (hf' x hx).uniqueDiffWithinAt (hs x hx) (hd x hx) theorem HasFDerivWithinAt.uniqueDiffWithinAt_of_continuousLinearEquiv {x : E} (e' : E ≃L[𝕜] F) (h : HasFDerivWithinAt f (e' : E →L[𝕜] F) s x) (hs : UniqueDiffWithinAt 𝕜 s x) : UniqueDiffWithinAt 𝕜 (f '' s) (f x) := h.uniqueDiffWithinAt hs e'.surjective.denseRange theorem ContinuousLinearEquiv.uniqueDiffOn_image (e : E ≃L[𝕜] F) (h : UniqueDiffOn 𝕜 s) : UniqueDiffOn 𝕜 (e '' s) := h.image (fun _ _ => e.hasFDerivWithinAt) fun _ _ => e.surjective.denseRange @[simp] theorem ContinuousLinearEquiv.uniqueDiffOn_image_iff (e : E ≃L[𝕜] F) : UniqueDiffOn 𝕜 (e '' s) ↔ UniqueDiffOn 𝕜 s := ⟨fun h => e.symm_image_image s ▸ e.symm.uniqueDiffOn_image h, e.uniqueDiffOn_image⟩ @[simp] theorem ContinuousLinearEquiv.uniqueDiffOn_preimage_iff (e : F ≃L[𝕜] E) : UniqueDiffOn 𝕜 (e ⁻¹' s) ↔ UniqueDiffOn 𝕜 s := by rw [← e.image_symm_eq_preimage, e.symm.uniqueDiffOn_image_iff] end TangentCone		Mathlib/Analysis/Calculus/FDeriv/Equiv.lean	512	517
/- 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.RightHomology /-! # Homology of short complexes In this file, we shall define the homology of short complexes `S`, i.e. diagrams `f : X₁ ⟶ X₂` and `g : X₂ ⟶ X₃` such that `f ≫ g = 0`. We shall say that `[S.HasHomology]` when there exists `h : S.HomologyData`. A homology data for `S` consists of compatible left/right homology data `left` and `right`. The left homology data `left` involves an object `left.H` that is a cokernel of the canonical map `S.X₁ ⟶ K` where `K` is a kernel of `g`. On the other hand, the dual notion `right.H` is a kernel of the canonical morphism `Q ⟶ S.X₃` when `Q` is a cokernel of `f`. The compatibility that is required involves an isomorphism `left.H ≅ right.H` which makes a certain pentagon commute. When such a homology data exists, `S.homology` shall be defined as `h.left.H` for a chosen `h : S.HomologyData`. This definition requires very little assumption on the category (only the existence of zero morphisms). We shall prove that in abelian categories, all short complexes have homology data. Note: This definition arose by the end of the Liquid Tensor Experiment which contained a structure `has_homology` which is quite similar to `S.HomologyData`. After the category `ShortComplex C` was introduced by J. Riou, A. Topaz suggested such a structure could be used as a basis for the definition of homology. -/ universe v u namespace CategoryTheory open Category Limits variable {C : Type u} [Category.{v} C] [HasZeroMorphisms C] (S : ShortComplex C) {S₁ S₂ S₃ S₄ : ShortComplex C} namespace ShortComplex /-- A homology data for a short complex consists of two compatible left and right homology data -/ structure HomologyData where /-- a left homology data -/ left : S.LeftHomologyData /-- a right homology data -/ right : S.RightHomologyData /-- the compatibility isomorphism relating the two dual notions of `LeftHomologyData` and `RightHomologyData` -/ iso : left.H ≅ right.H /-- the pentagon relation expressing the compatibility of the left and right homology data -/ comm : left.π ≫ iso.hom ≫ right.ι = left.i ≫ right.p := by aesop_cat attribute [reassoc (attr := simp)] HomologyData.comm variable (φ : S₁ ⟶ S₂) (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) /-- A homology map data for a morphism `φ : S₁ ⟶ S₂` where both `S₁` and `S₂` are equipped with homology data consists of left and right homology map data. -/ structure HomologyMapData where /-- a left homology map data -/ left : LeftHomologyMapData φ h₁.left h₂.left /-- a right homology map data -/ right : RightHomologyMapData φ h₁.right h₂.right namespace HomologyMapData variable {φ h₁ h₂} @[reassoc] lemma comm (h : HomologyMapData φ h₁ h₂) : h.left.φH ≫ h₂.iso.hom = h₁.iso.hom ≫ h.right.φH := by simp only [← cancel_epi h₁.left.π, ← cancel_mono h₂.right.ι, assoc, LeftHomologyMapData.commπ_assoc, HomologyData.comm, LeftHomologyMapData.commi_assoc, RightHomologyMapData.commι, HomologyData.comm_assoc, RightHomologyMapData.commp] instance : Subsingleton (HomologyMapData φ h₁ h₂) := ⟨by rintro ⟨left₁, right₁⟩ ⟨left₂, right₂⟩ simp only [mk.injEq, eq_iff_true_of_subsingleton, and_self]⟩ instance : Inhabited (HomologyMapData φ h₁ h₂) := ⟨⟨default, default⟩⟩ instance : Unique (HomologyMapData φ h₁ h₂) := Unique.mk' _ variable (φ h₁ h₂) /-- A choice of the (unique) homology map data associated with a morphism `φ : S₁ ⟶ S₂` where both short complexes `S₁` and `S₂` are equipped with homology data. -/ def homologyMapData : HomologyMapData φ h₁ h₂ := default variable {φ h₁ h₂} lemma congr_left_φH {γ₁ γ₂ : HomologyMapData φ h₁ h₂} (eq : γ₁ = γ₂) : γ₁.left.φH = γ₂.left.φH := by rw [eq] end HomologyMapData namespace HomologyData /-- When the first map `S.f` is zero, this is the homology data on `S` given by any limit kernel fork of `S.g` -/ @[simps] def ofIsLimitKernelFork (hf : S.f = 0) (c : KernelFork S.g) (hc : IsLimit c) : S.HomologyData where left := LeftHomologyData.ofIsLimitKernelFork S hf c hc right := RightHomologyData.ofIsLimitKernelFork S hf c hc iso := Iso.refl _ /-- When the first map `S.f` is zero, this is the homology data on `S` given by the chosen `kernel S.g` -/ @[simps] noncomputable def ofHasKernel (hf : S.f = 0) [HasKernel S.g] : S.HomologyData where left := LeftHomologyData.ofHasKernel S hf right := RightHomologyData.ofHasKernel S hf iso := Iso.refl _ /-- When the second map `S.g` is zero, this is the homology data on `S` given by any colimit cokernel cofork of `S.f` -/ @[simps] def ofIsColimitCokernelCofork (hg : S.g = 0) (c : CokernelCofork S.f) (hc : IsColimit c) : S.HomologyData where left := LeftHomologyData.ofIsColimitCokernelCofork S hg c hc right := RightHomologyData.ofIsColimitCokernelCofork S hg c hc iso := Iso.refl _ /-- When the second map `S.g` is zero, this is the homology data on `S` given by the chosen `cokernel S.f` -/ @[simps] noncomputable def ofHasCokernel (hg : S.g = 0) [HasCokernel S.f] : S.HomologyData where left := LeftHomologyData.ofHasCokernel S hg right := RightHomologyData.ofHasCokernel S hg iso := Iso.refl _ /-- When both `S.f` and `S.g` are zero, the middle object `S.X₂` gives a homology data on S -/ @[simps] noncomputable def ofZeros (hf : S.f = 0) (hg : S.g = 0) : S.HomologyData where left := LeftHomologyData.ofZeros S hf hg right := RightHomologyData.ofZeros S hf hg iso := Iso.refl _ /-- If `φ : S₁ ⟶ S₂` is a morphism of short complexes such that `φ.τ₁` is epi, `φ.τ₂` is an iso and `φ.τ₃` is mono, then a homology data for `S₁` induces a homology data for `S₂`. The inverse construction is `ofEpiOfIsIsoOfMono'`. -/ @[simps] noncomputable def ofEpiOfIsIsoOfMono (φ : S₁ ⟶ S₂) (h : HomologyData S₁) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : HomologyData S₂ where left := LeftHomologyData.ofEpiOfIsIsoOfMono φ h.left right := RightHomologyData.ofEpiOfIsIsoOfMono φ h.right iso := h.iso /-- If `φ : S₁ ⟶ S₂` is a morphism of short complexes such that `φ.τ₁` is epi, `φ.τ₂` is an iso and `φ.τ₃` is mono, then a homology data for `S₂` induces a homology data for `S₁`. The inverse construction is `ofEpiOfIsIsoOfMono`. -/ @[simps] noncomputable def ofEpiOfIsIsoOfMono' (φ : S₁ ⟶ S₂) (h : HomologyData S₂) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : HomologyData S₁ where left := LeftHomologyData.ofEpiOfIsIsoOfMono' φ h.left right := RightHomologyData.ofEpiOfIsIsoOfMono' φ h.right iso := h.iso /-- If `e : S₁ ≅ S₂` is an isomorphism of short complexes and `h₁ : HomologyData S₁`, this is the homology data for `S₂` deduced from the isomorphism. -/ @[simps!] noncomputable def ofIso (e : S₁ ≅ S₂) (h : HomologyData S₁) := h.ofEpiOfIsIsoOfMono e.hom variable {S} /-- A homology data for a short complex `S` induces a homology data for `S.op`. -/ @[simps] def op (h : S.HomologyData) : S.op.HomologyData where left := h.right.op right := h.left.op iso := h.iso.op comm := Quiver.Hom.unop_inj (by simp) /-- A homology data for a short complex `S` in the opposite category induces a homology data for `S.unop`. -/ @[simps] def unop {S : ShortComplex Cᵒᵖ} (h : S.HomologyData) : S.unop.HomologyData where left := h.right.unop right := h.left.unop iso := h.iso.unop comm := Quiver.Hom.op_inj (by simp) end HomologyData /-- A short complex `S` has homology when there exists a `S.HomologyData` -/ class HasHomology : Prop where /-- the condition that there exists a homology data -/ condition : Nonempty S.HomologyData /-- A chosen `S.HomologyData` for a short complex `S` that has homology -/ noncomputable def homologyData [HasHomology S] : S.HomologyData := HasHomology.condition.some variable {S} lemma HasHomology.mk' (h : S.HomologyData) : HasHomology S := ⟨Nonempty.intro h⟩ instance [HasHomology S] : HasHomology S.op := HasHomology.mk' S.homologyData.op instance (S : ShortComplex Cᵒᵖ) [HasHomology S] : HasHomology S.unop := HasHomology.mk' S.homologyData.unop instance hasLeftHomology_of_hasHomology [S.HasHomology] : S.HasLeftHomology := HasLeftHomology.mk' S.homologyData.left instance hasRightHomology_of_hasHomology [S.HasHomology] : S.HasRightHomology := HasRightHomology.mk' S.homologyData.right instance hasHomology_of_hasCokernel {X Y : C} (f : X ⟶ Y) (Z : C) [HasCokernel f] : (ShortComplex.mk f (0 : Y ⟶ Z) comp_zero).HasHomology := HasHomology.mk' (HomologyData.ofHasCokernel _ rfl) instance hasHomology_of_hasKernel {Y Z : C} (g : Y ⟶ Z) (X : C) [HasKernel g] : (ShortComplex.mk (0 : X ⟶ Y) g zero_comp).HasHomology := HasHomology.mk' (HomologyData.ofHasKernel _ rfl) instance hasHomology_of_zeros (X Y Z : C) : (ShortComplex.mk (0 : X ⟶ Y) (0 : Y ⟶ Z) zero_comp).HasHomology := HasHomology.mk' (HomologyData.ofZeros _ rfl rfl) lemma hasHomology_of_epi_of_isIso_of_mono (φ : S₁ ⟶ S₂) [HasHomology S₁] [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : HasHomology S₂ := HasHomology.mk' (HomologyData.ofEpiOfIsIsoOfMono φ S₁.homologyData) lemma hasHomology_of_epi_of_isIso_of_mono' (φ : S₁ ⟶ S₂) [HasHomology S₂] [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : HasHomology S₁ := HasHomology.mk' (HomologyData.ofEpiOfIsIsoOfMono' φ S₂.homologyData) lemma hasHomology_of_iso (e : S₁ ≅ S₂) [HasHomology S₁] : HasHomology S₂ := HasHomology.mk' (HomologyData.ofIso e S₁.homologyData) namespace HomologyMapData /-- The homology map data associated to the identity morphism of a short complex. -/ @[simps] def id (h : S.HomologyData) : HomologyMapData (𝟙 S) h h where left := LeftHomologyMapData.id h.left right := RightHomologyMapData.id h.right /-- The homology map data associated to the zero morphism between two short complexes. -/ @[simps] def zero (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) : HomologyMapData 0 h₁ h₂ where left := LeftHomologyMapData.zero h₁.left h₂.left right := RightHomologyMapData.zero h₁.right h₂.right /-- The composition of homology map data. -/ @[simps] def comp {φ : S₁ ⟶ S₂} {φ' : S₂ ⟶ S₃} {h₁ : S₁.HomologyData} {h₂ : S₂.HomologyData} {h₃ : S₃.HomologyData} (ψ : HomologyMapData φ h₁ h₂) (ψ' : HomologyMapData φ' h₂ h₃) : HomologyMapData (φ ≫ φ') h₁ h₃ where left := ψ.left.comp ψ'.left right := ψ.right.comp ψ'.right /-- A homology map data for a morphism of short complexes induces a homology map data in the opposite category. -/ @[simps] def op {φ : S₁ ⟶ S₂} {h₁ : S₁.HomologyData} {h₂ : S₂.HomologyData} (ψ : HomologyMapData φ h₁ h₂) : HomologyMapData (opMap φ) h₂.op h₁.op where left := ψ.right.op right := ψ.left.op /-- A homology map data for a morphism of short complexes in the opposite category induces a homology map data in the original category. -/ @[simps] def unop {S₁ S₂ : ShortComplex Cᵒᵖ} {φ : S₁ ⟶ S₂} {h₁ : S₁.HomologyData} {h₂ : S₂.HomologyData} (ψ : HomologyMapData φ h₁ h₂) : HomologyMapData (unopMap φ) h₂.unop h₁.unop where left := ψ.right.unop right := ψ.left.unop /-- When `S₁.f`, `S₁.g`, `S₂.f` and `S₂.g` are all zero, the action on homology of a morphism `φ : S₁ ⟶ S₂` is given by the action `φ.τ₂` on the middle objects. -/ @[simps] def ofZeros (φ : S₁ ⟶ S₂) (hf₁ : S₁.f = 0) (hg₁ : S₁.g = 0) (hf₂ : S₂.f = 0) (hg₂ : S₂.g = 0) : HomologyMapData φ (HomologyData.ofZeros S₁ hf₁ hg₁) (HomologyData.ofZeros S₂ hf₂ hg₂) where left := LeftHomologyMapData.ofZeros φ hf₁ hg₁ hf₂ hg₂ right := RightHomologyMapData.ofZeros φ hf₁ hg₁ hf₂ hg₂ /-- When `S₁.g` and `S₂.g` are zero and we have chosen colimit cokernel coforks `c₁` and `c₂` for `S₁.f` and `S₂.f` respectively, the action on homology of a morphism `φ : S₁ ⟶ S₂` of short complexes is given by the unique morphism `f : c₁.pt ⟶ c₂.pt` such that `φ.τ₂ ≫ c₂.π = c₁.π ≫ f`. -/ @[simps] def ofIsColimitCokernelCofork (φ : S₁ ⟶ S₂) (hg₁ : S₁.g = 0) (c₁ : CokernelCofork S₁.f) (hc₁ : IsColimit c₁) (hg₂ : S₂.g = 0) (c₂ : CokernelCofork S₂.f) (hc₂ : IsColimit c₂) (f : c₁.pt ⟶ c₂.pt) (comm : φ.τ₂ ≫ c₂.π = c₁.π ≫ f) : HomologyMapData φ (HomologyData.ofIsColimitCokernelCofork S₁ hg₁ c₁ hc₁) (HomologyData.ofIsColimitCokernelCofork S₂ hg₂ c₂ hc₂) where left := LeftHomologyMapData.ofIsColimitCokernelCofork φ hg₁ c₁ hc₁ hg₂ c₂ hc₂ f comm right := RightHomologyMapData.ofIsColimitCokernelCofork φ hg₁ c₁ hc₁ hg₂ c₂ hc₂ f comm /-- When `S₁.f` and `S₂.f` are zero and we have chosen limit kernel forks `c₁` and `c₂` for `S₁.g` and `S₂.g` respectively, the action on homology of a morphism `φ : S₁ ⟶ S₂` of short complexes is given by the unique morphism `f : c₁.pt ⟶ c₂.pt` such that `c₁.ι ≫ φ.τ₂ = f ≫ c₂.ι`. -/ @[simps] def ofIsLimitKernelFork (φ : S₁ ⟶ S₂) (hf₁ : S₁.f = 0) (c₁ : KernelFork S₁.g) (hc₁ : IsLimit c₁) (hf₂ : S₂.f = 0) (c₂ : KernelFork S₂.g) (hc₂ : IsLimit c₂) (f : c₁.pt ⟶ c₂.pt) (comm : c₁.ι ≫ φ.τ₂ = f ≫ c₂.ι) : HomologyMapData φ (HomologyData.ofIsLimitKernelFork S₁ hf₁ c₁ hc₁) (HomologyData.ofIsLimitKernelFork S₂ hf₂ c₂ hc₂) where left := LeftHomologyMapData.ofIsLimitKernelFork φ hf₁ c₁ hc₁ hf₂ c₂ hc₂ f comm right := RightHomologyMapData.ofIsLimitKernelFork φ hf₁ c₁ hc₁ hf₂ c₂ hc₂ f comm /-- When both maps `S.f` and `S.g` of a short complex `S` are zero, this is the homology map data (for the identity of `S`) which relates the homology data `ofZeros` and `ofIsColimitCokernelCofork`. -/ def compatibilityOfZerosOfIsColimitCokernelCofork (hf : S.f = 0) (hg : S.g = 0) (c : CokernelCofork S.f) (hc : IsColimit c) : HomologyMapData (𝟙 S) (HomologyData.ofZeros S hf hg) (HomologyData.ofIsColimitCokernelCofork S hg c hc) where left := LeftHomologyMapData.compatibilityOfZerosOfIsColimitCokernelCofork S hf hg c hc right := RightHomologyMapData.compatibilityOfZerosOfIsColimitCokernelCofork S hf hg c hc /-- When both maps `S.f` and `S.g` of a short complex `S` are zero, this is the homology map data (for the identity of `S`) which relates the homology data `HomologyData.ofIsLimitKernelFork` and `ofZeros` . -/ @[simps] def compatibilityOfZerosOfIsLimitKernelFork (hf : S.f = 0) (hg : S.g = 0) (c : KernelFork S.g) (hc : IsLimit c) : HomologyMapData (𝟙 S) (HomologyData.ofIsLimitKernelFork S hf c hc) (HomologyData.ofZeros S hf hg) where left := LeftHomologyMapData.compatibilityOfZerosOfIsLimitKernelFork S hf hg c hc right := RightHomologyMapData.compatibilityOfZerosOfIsLimitKernelFork S hf hg c hc /-- This homology map data expresses compatibilities of the homology data constructed by `HomologyData.ofEpiOfIsIsoOfMono` -/ noncomputable def ofEpiOfIsIsoOfMono (φ : S₁ ⟶ S₂) (h : HomologyData S₁) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : HomologyMapData φ h (HomologyData.ofEpiOfIsIsoOfMono φ h) where left := LeftHomologyMapData.ofEpiOfIsIsoOfMono φ h.left right := RightHomologyMapData.ofEpiOfIsIsoOfMono φ h.right /-- This homology map data expresses compatibilities of the homology data constructed by `HomologyData.ofEpiOfIsIsoOfMono'` -/ noncomputable def ofEpiOfIsIsoOfMono' (φ : S₁ ⟶ S₂) (h : HomologyData S₂) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : HomologyMapData φ (HomologyData.ofEpiOfIsIsoOfMono' φ h) h where left := LeftHomologyMapData.ofEpiOfIsIsoOfMono' φ h.left right := RightHomologyMapData.ofEpiOfIsIsoOfMono' φ h.right end HomologyMapData variable (S) /-- The homology of a short complex is the `left.H` field of a chosen homology data. -/ noncomputable def homology [HasHomology S] : C := S.homologyData.left.H /-- When a short complex has homology, this is the canonical isomorphism `S.leftHomology ≅ S.homology`. -/ noncomputable def leftHomologyIso [S.HasHomology] : S.leftHomology ≅ S.homology := leftHomologyMapIso' (Iso.refl _) _ _ /-- When a short complex has homology, this is the canonical isomorphism `S.rightHomology ≅ S.homology`. -/ noncomputable def rightHomologyIso [S.HasHomology] : S.rightHomology ≅ S.homology := rightHomologyMapIso' (Iso.refl _) _ _ ≪≫ S.homologyData.iso.symm variable {S} /-- When a short complex has homology, its homology can be computed using any left homology data. -/ noncomputable def LeftHomologyData.homologyIso (h : S.LeftHomologyData) [S.HasHomology] : S.homology ≅ h.H := S.leftHomologyIso.symm ≪≫ h.leftHomologyIso /-- When a short complex has homology, its homology can be computed using any right homology data. -/ noncomputable def RightHomologyData.homologyIso (h : S.RightHomologyData) [S.HasHomology] : S.homology ≅ h.H := S.rightHomologyIso.symm ≪≫ h.rightHomologyIso variable (S) @[simp] lemma LeftHomologyData.homologyIso_leftHomologyData [S.HasHomology] : S.leftHomologyData.homologyIso = S.leftHomologyIso.symm := by ext dsimp [homologyIso, leftHomologyIso, ShortComplex.leftHomologyIso] rw [← leftHomologyMap'_comp, comp_id] @[simp] lemma RightHomologyData.homologyIso_rightHomologyData [S.HasHomology] : S.rightHomologyData.homologyIso = S.rightHomologyIso.symm := by ext simp [homologyIso, rightHomologyIso] variable {S} /-- Given a morphism `φ : S₁ ⟶ S₂` of short complexes and homology data `h₁` and `h₂` for `S₁` and `S₂` respectively, this is the induced homology map `h₁.left.H ⟶ h₁.left.H`. -/ def homologyMap' (φ : S₁ ⟶ S₂) (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) : h₁.left.H ⟶ h₂.left.H := leftHomologyMap' φ _ _ /-- The homology map `S₁.homology ⟶ S₂.homology` induced by a morphism `S₁ ⟶ S₂` of short complexes. -/ noncomputable def homologyMap (φ : S₁ ⟶ S₂) [HasHomology S₁] [HasHomology S₂] : S₁.homology ⟶ S₂.homology := homologyMap' φ _ _ namespace HomologyMapData variable {φ : S₁ ⟶ S₂} {h₁ : S₁.HomologyData} {h₂ : S₂.HomologyData} (γ : HomologyMapData φ h₁ h₂) lemma homologyMap'_eq : homologyMap' φ h₁ h₂ = γ.left.φH := LeftHomologyMapData.congr_φH (Subsingleton.elim _ _) lemma cyclesMap'_eq : cyclesMap' φ h₁.left h₂.left = γ.left.φK := LeftHomologyMapData.congr_φK (Subsingleton.elim _ _) lemma opcyclesMap'_eq : opcyclesMap' φ h₁.right h₂.right = γ.right.φQ := RightHomologyMapData.congr_φQ (Subsingleton.elim _ _) end HomologyMapData namespace LeftHomologyMapData variable {h₁ : S₁.LeftHomologyData} {h₂ : S₂.LeftHomologyData} (γ : LeftHomologyMapData φ h₁ h₂) [S₁.HasHomology] [S₂.HasHomology] lemma homologyMap_eq : homologyMap φ = h₁.homologyIso.hom ≫ γ.φH ≫ h₂.homologyIso.inv := by dsimp [homologyMap, LeftHomologyData.homologyIso, leftHomologyIso, LeftHomologyData.leftHomologyIso, homologyMap'] simp only [← γ.leftHomologyMap'_eq, ← leftHomologyMap'_comp, id_comp, comp_id] lemma homologyMap_comm : homologyMap φ ≫ h₂.homologyIso.hom = h₁.homologyIso.hom ≫ γ.φH := by simp only [γ.homologyMap_eq, assoc, Iso.inv_hom_id, comp_id] end LeftHomologyMapData namespace RightHomologyMapData variable {h₁ : S₁.RightHomologyData} {h₂ : S₂.RightHomologyData} (γ : RightHomologyMapData φ h₁ h₂) [S₁.HasHomology] [S₂.HasHomology] lemma homologyMap_eq : homologyMap φ = h₁.homologyIso.hom ≫ γ.φH ≫ h₂.homologyIso.inv := by dsimp [homologyMap, homologyMap', RightHomologyData.homologyIso, rightHomologyIso, RightHomologyData.rightHomologyIso] have γ' : HomologyMapData φ S₁.homologyData S₂.homologyData := default simp only [← γ.rightHomologyMap'_eq, assoc, ← rightHomologyMap'_comp_assoc, id_comp, comp_id, γ'.left.leftHomologyMap'_eq, γ'.right.rightHomologyMap'_eq, ← γ'.comm_assoc, Iso.hom_inv_id] lemma homologyMap_comm : homologyMap φ ≫ h₂.homologyIso.hom = h₁.homologyIso.hom ≫ γ.φH := by simp only [γ.homologyMap_eq, assoc, Iso.inv_hom_id, comp_id] end RightHomologyMapData @[simp] lemma homologyMap'_id (h : S.HomologyData) : homologyMap' (𝟙 S) h h = 𝟙 _ := (HomologyMapData.id h).homologyMap'_eq variable (S) @[simp] lemma homologyMap_id [HasHomology S] : homologyMap (𝟙 S) = 𝟙 _ := homologyMap'_id _ @[simp] lemma homologyMap'_zero (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) : homologyMap' 0 h₁ h₂ = 0 := (HomologyMapData.zero h₁ h₂).homologyMap'_eq variable (S₁ S₂) @[simp] lemma homologyMap_zero [S₁.HasHomology] [S₂.HasHomology] : homologyMap (0 : S₁ ⟶ S₂) = 0 := homologyMap'_zero _ _ variable {S₁ S₂} lemma homologyMap'_comp (φ₁ : S₁ ⟶ S₂) (φ₂ : S₂ ⟶ S₃) (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) (h₃ : S₃.HomologyData) : homologyMap' (φ₁ ≫ φ₂) h₁ h₃ = homologyMap' φ₁ h₁ h₂ ≫ homologyMap' φ₂ h₂ h₃ := leftHomologyMap'_comp _ _ _ _ _ @[simp] lemma homologyMap_comp [HasHomology S₁] [HasHomology S₂] [HasHomology S₃] (φ₁ : S₁ ⟶ S₂) (φ₂ : S₂ ⟶ S₃) : homologyMap (φ₁ ≫ φ₂) = homologyMap φ₁ ≫ homologyMap φ₂ := homologyMap'_comp _ _ _ _ _ /-- Given an isomorphism `S₁ ≅ S₂` of short complexes and homology data `h₁` and `h₂` for `S₁` and `S₂` respectively, this is the induced homology isomorphism `h₁.left.H ≅ h₁.left.H`. -/ @[simps] def homologyMapIso' (e : S₁ ≅ S₂) (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) : h₁.left.H ≅ h₂.left.H where hom := homologyMap' e.hom h₁ h₂ inv := homologyMap' e.inv h₂ h₁ hom_inv_id := by rw [← homologyMap'_comp, e.hom_inv_id, homologyMap'_id] inv_hom_id := by rw [← homologyMap'_comp, e.inv_hom_id, homologyMap'_id] instance isIso_homologyMap'_of_isIso (φ : S₁ ⟶ S₂) [IsIso φ] (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) : IsIso (homologyMap' φ h₁ h₂) := (inferInstance : IsIso (homologyMapIso' (asIso φ) h₁ h₂).hom) /-- The homology isomorphism `S₁.homology ⟶ S₂.homology` induced by an isomorphism `S₁ ≅ S₂` of short complexes. -/ @[simps] noncomputable def homologyMapIso (e : S₁ ≅ S₂) [S₁.HasHomology] [S₂.HasHomology] : S₁.homology ≅ S₂.homology where hom := homologyMap e.hom inv := homologyMap e.inv hom_inv_id := by rw [← homologyMap_comp, e.hom_inv_id, homologyMap_id] inv_hom_id := by rw [← homologyMap_comp, e.inv_hom_id, homologyMap_id] instance isIso_homologyMap_of_iso (φ : S₁ ⟶ S₂) [IsIso φ] [S₁.HasHomology] [S₂.HasHomology] : IsIso (homologyMap φ) := (inferInstance : IsIso (homologyMapIso (asIso φ)).hom) variable {S} section variable (h₁ : S.LeftHomologyData) (h₂ : S.RightHomologyData) /-- If a short complex `S` has both a left homology data `h₁` and a right homology data `h₂`, this is the canonical morphism `h₁.H ⟶ h₂.H`. -/ def leftRightHomologyComparison' : h₁.H ⟶ h₂.H := h₂.liftH (h₁.descH (h₁.i ≫ h₂.p) (by simp)) (by rw [← cancel_epi h₁.π, LeftHomologyData.π_descH_assoc, assoc, RightHomologyData.p_g', LeftHomologyData.wi, comp_zero]) lemma leftRightHomologyComparison'_eq_liftH : leftRightHomologyComparison' h₁ h₂ = h₂.liftH (h₁.descH (h₁.i ≫ h₂.p) (by simp)) (by rw [← cancel_epi h₁.π, LeftHomologyData.π_descH_assoc, assoc, RightHomologyData.p_g', LeftHomologyData.wi, comp_zero]) := rfl @[reassoc (attr := simp)] lemma π_leftRightHomologyComparison'_ι : h₁.π ≫ leftRightHomologyComparison' h₁ h₂ ≫ h₂.ι = h₁.i ≫ h₂.p := by simp only [leftRightHomologyComparison'_eq_liftH, RightHomologyData.liftH_ι, LeftHomologyData.π_descH] lemma leftRightHomologyComparison'_eq_descH : leftRightHomologyComparison' h₁ h₂ = h₁.descH (h₂.liftH (h₁.i ≫ h₂.p) (by simp)) (by rw [← cancel_mono h₂.ι, assoc, RightHomologyData.liftH_ι, LeftHomologyData.f'_i_assoc, RightHomologyData.wp, zero_comp]) := by simp only [← cancel_mono h₂.ι, ← cancel_epi h₁.π, π_leftRightHomologyComparison'_ι, LeftHomologyData.π_descH_assoc, RightHomologyData.liftH_ι] end variable (S) /-- If a short complex `S` has both a left and right homology, this is the canonical morphism `S.leftHomology ⟶ S.rightHomology`. -/ noncomputable def leftRightHomologyComparison [S.HasLeftHomology] [S.HasRightHomology] : S.leftHomology ⟶ S.rightHomology := leftRightHomologyComparison' _ _ @[reassoc (attr := simp)] lemma π_leftRightHomologyComparison_ι [S.HasLeftHomology] [S.HasRightHomology] : S.leftHomologyπ ≫ S.leftRightHomologyComparison ≫ S.rightHomologyι = S.iCycles ≫ S.pOpcycles := π_leftRightHomologyComparison'_ι _ _ @[reassoc] lemma leftRightHomologyComparison'_naturality (φ : S₁ ⟶ S₂) (h₁ : S₁.LeftHomologyData) (h₂ : S₁.RightHomologyData) (h₁' : S₂.LeftHomologyData) (h₂' : S₂.RightHomologyData) : leftHomologyMap' φ h₁ h₁' ≫ leftRightHomologyComparison' h₁' h₂' = leftRightHomologyComparison' h₁ h₂ ≫ rightHomologyMap' φ h₂ h₂' := by simp only [← cancel_epi h₁.π, ← cancel_mono h₂'.ι, assoc, leftHomologyπ_naturality'_assoc, rightHomologyι_naturality', π_leftRightHomologyComparison'_ι, π_leftRightHomologyComparison'_ι_assoc, cyclesMap'_i_assoc, p_opcyclesMap'] variable {S} lemma leftRightHomologyComparison'_compatibility (h₁ h₁' : S.LeftHomologyData) (h₂ h₂' : S.RightHomologyData) : leftRightHomologyComparison' h₁ h₂ = leftHomologyMap' (𝟙 S) h₁ h₁' ≫ leftRightHomologyComparison' h₁' h₂' ≫ rightHomologyMap' (𝟙 S) _ _ := by rw [leftRightHomologyComparison'_naturality_assoc (𝟙 S) h₁ h₂ h₁' h₂', ← rightHomologyMap'_comp, comp_id, rightHomologyMap'_id, comp_id] lemma leftRightHomologyComparison_eq [S.HasLeftHomology] [S.HasRightHomology] (h₁ : S.LeftHomologyData) (h₂ : S.RightHomologyData) : S.leftRightHomologyComparison = h₁.leftHomologyIso.hom ≫ leftRightHomologyComparison' h₁ h₂ ≫ h₂.rightHomologyIso.inv := leftRightHomologyComparison'_compatibility _ _ _ _ @[simp] lemma HomologyData.leftRightHomologyComparison'_eq (h : S.HomologyData) : leftRightHomologyComparison' h.left h.right = h.iso.hom := by simp only [← cancel_epi h.left.π, ← cancel_mono h.right.ι, assoc, π_leftRightHomologyComparison'_ι, comm] instance isIso_leftRightHomologyComparison'_of_homologyData (h : S.HomologyData) : IsIso (leftRightHomologyComparison' h.left h.right) := by rw [h.leftRightHomologyComparison'_eq] infer_instance instance isIso_leftRightHomologyComparison' [S.HasHomology] (h₁ : S.LeftHomologyData) (h₂ : S.RightHomologyData) : IsIso (leftRightHomologyComparison' h₁ h₂) := by rw [leftRightHomologyComparison'_compatibility h₁ S.homologyData.left h₂ S.homologyData.right] infer_instance instance isIso_leftRightHomologyComparison [S.HasHomology] : IsIso S.leftRightHomologyComparison := by dsimp only [leftRightHomologyComparison] infer_instance namespace HomologyData /-- This is the homology data for a short complex `S` that is obtained from a left homology data `h₁` and a right homology data `h₂` when the comparison morphism `leftRightHomologyComparison' h₁ h₂ : h₁.H ⟶ h₂.H` is an isomorphism. -/ @[simps] noncomputable def ofIsIsoLeftRightHomologyComparison' (h₁ : S.LeftHomologyData) (h₂ : S.RightHomologyData) [IsIso (leftRightHomologyComparison' h₁ h₂)] : S.HomologyData where left := h₁ right := h₂ iso := asIso (leftRightHomologyComparison' h₁ h₂) end HomologyData lemma leftRightHomologyComparison'_eq_leftHomologpMap'_comp_iso_hom_comp_rightHomologyMap' (h : S.HomologyData) (h₁ : S.LeftHomologyData) (h₂ : S.RightHomologyData) : leftRightHomologyComparison' h₁ h₂ = leftHomologyMap' (𝟙 S) h₁ h.left ≫ h.iso.hom ≫ rightHomologyMap' (𝟙 S) h.right h₂ := by simpa only [h.leftRightHomologyComparison'_eq] using leftRightHomologyComparison'_compatibility h₁ h.left h₂ h.right @[reassoc] lemma leftRightHomologyComparison'_fac (h₁ : S.LeftHomologyData) (h₂ : S.RightHomologyData) [S.HasHomology] : leftRightHomologyComparison' h₁ h₂ = h₁.homologyIso.inv ≫ h₂.homologyIso.hom := by rw [leftRightHomologyComparison'_eq_leftHomologpMap'_comp_iso_hom_comp_rightHomologyMap' S.homologyData h₁ h₂] dsimp only [LeftHomologyData.homologyIso, LeftHomologyData.leftHomologyIso, Iso.symm, Iso.trans, Iso.refl, leftHomologyMapIso', leftHomologyIso, RightHomologyData.homologyIso, RightHomologyData.rightHomologyIso, rightHomologyMapIso', rightHomologyIso] simp only [assoc, ← leftHomologyMap'_comp_assoc, id_comp, ← rightHomologyMap'_comp] variable (S) @[reassoc] lemma leftRightHomologyComparison_fac [S.HasHomology] : S.leftRightHomologyComparison = S.leftHomologyIso.hom ≫ S.rightHomologyIso.inv := by simpa only [LeftHomologyData.homologyIso_leftHomologyData, Iso.symm_inv, RightHomologyData.homologyIso_rightHomologyData, Iso.symm_hom] using leftRightHomologyComparison'_fac S.leftHomologyData S.rightHomologyData variable {S} lemma HomologyData.right_homologyIso_eq_left_homologyIso_trans_iso (h : S.HomologyData) [S.HasHomology] : h.right.homologyIso = h.left.homologyIso ≪≫ h.iso := by suffices h.iso = h.left.homologyIso.symm ≪≫ h.right.homologyIso by rw [this, Iso.self_symm_id_assoc] ext dsimp rw [← leftRightHomologyComparison'_fac, leftRightHomologyComparison'_eq] lemma hasHomology_of_isIso_leftRightHomologyComparison' (h₁ : S.LeftHomologyData) (h₂ : S.RightHomologyData) [IsIso (leftRightHomologyComparison' h₁ h₂)] : S.HasHomology := HasHomology.mk' (HomologyData.ofIsIsoLeftRightHomologyComparison' h₁ h₂) lemma hasHomology_of_isIsoLeftRightHomologyComparison [S.HasLeftHomology] [S.HasRightHomology] [h : IsIso S.leftRightHomologyComparison] : S.HasHomology := by haveI : IsIso (leftRightHomologyComparison' S.leftHomologyData S.rightHomologyData) := h exact hasHomology_of_isIso_leftRightHomologyComparison' S.leftHomologyData S.rightHomologyData section variable [S₁.HasHomology] [S₂.HasHomology] (φ : S₁ ⟶ S₂) @[reassoc] lemma LeftHomologyData.leftHomologyIso_hom_naturality (h₁ : S₁.LeftHomologyData) (h₂ : S₂.LeftHomologyData) : h₁.homologyIso.hom ≫ leftHomologyMap' φ h₁ h₂ = homologyMap φ ≫ h₂.homologyIso.hom := by dsimp [homologyIso, ShortComplex.leftHomologyIso, homologyMap, homologyMap', leftHomologyIso] simp only [← leftHomologyMap'_comp, id_comp, comp_id] @[reassoc] lemma LeftHomologyData.leftHomologyIso_inv_naturality (h₁ : S₁.LeftHomologyData) (h₂ : S₂.LeftHomologyData) : h₁.homologyIso.inv ≫ homologyMap φ = leftHomologyMap' φ h₁ h₂ ≫ h₂.homologyIso.inv := by dsimp [homologyIso, ShortComplex.leftHomologyIso, homologyMap, homologyMap', leftHomologyIso] simp only [← leftHomologyMap'_comp, id_comp, comp_id] @[reassoc] lemma leftHomologyIso_hom_naturality : S₁.leftHomologyIso.hom ≫ homologyMap φ = leftHomologyMap φ ≫ S₂.leftHomologyIso.hom := by simpa only [LeftHomologyData.homologyIso_leftHomologyData, Iso.symm_inv] using LeftHomologyData.leftHomologyIso_inv_naturality φ S₁.leftHomologyData S₂.leftHomologyData @[reassoc] lemma leftHomologyIso_inv_naturality : S₁.leftHomologyIso.inv ≫ leftHomologyMap φ = homologyMap φ ≫ S₂.leftHomologyIso.inv := by simpa only [LeftHomologyData.homologyIso_leftHomologyData, Iso.symm_inv] using LeftHomologyData.leftHomologyIso_hom_naturality φ S₁.leftHomologyData S₂.leftHomologyData @[reassoc] lemma RightHomologyData.rightHomologyIso_hom_naturality (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) : h₁.homologyIso.hom ≫ rightHomologyMap' φ h₁ h₂ = homologyMap φ ≫ h₂.homologyIso.hom := by rw [← cancel_epi h₁.homologyIso.inv, Iso.inv_hom_id_assoc, ← cancel_epi (leftRightHomologyComparison' S₁.leftHomologyData h₁), ← leftRightHomologyComparison'_naturality φ S₁.leftHomologyData h₁ S₂.leftHomologyData h₂, ← cancel_epi (S₁.leftHomologyData.homologyIso.hom), LeftHomologyData.leftHomologyIso_hom_naturality_assoc, leftRightHomologyComparison'_fac, leftRightHomologyComparison'_fac, assoc, Iso.hom_inv_id_assoc, Iso.hom_inv_id_assoc, Iso.hom_inv_id_assoc] @[reassoc] lemma RightHomologyData.rightHomologyIso_inv_naturality (h₁ : S₁.RightHomologyData) (h₂ : S₂.RightHomologyData) : h₁.homologyIso.inv ≫ homologyMap φ = rightHomologyMap' φ h₁ h₂ ≫ h₂.homologyIso.inv := by simp only [← cancel_mono h₂.homologyIso.hom, assoc, Iso.inv_hom_id_assoc, comp_id, ← RightHomologyData.rightHomologyIso_hom_naturality φ h₁ h₂, Iso.inv_hom_id] @[reassoc] lemma rightHomologyIso_hom_naturality : S₁.rightHomologyIso.hom ≫ homologyMap φ = rightHomologyMap φ ≫ S₂.rightHomologyIso.hom := by simpa only [RightHomologyData.homologyIso_rightHomologyData, Iso.symm_inv] using RightHomologyData.rightHomologyIso_inv_naturality φ S₁.rightHomologyData S₂.rightHomologyData @[reassoc] lemma rightHomologyIso_inv_naturality : S₁.rightHomologyIso.inv ≫ rightHomologyMap φ = homologyMap φ ≫ S₂.rightHomologyIso.inv := by simpa only [RightHomologyData.homologyIso_rightHomologyData, Iso.symm_inv] using RightHomologyData.rightHomologyIso_hom_naturality φ S₁.rightHomologyData S₂.rightHomologyData end variable (C) /-- We shall say that a category `C` is a category with homology when all short complexes have homology. -/ class _root_.CategoryTheory.CategoryWithHomology : Prop where hasHomology : ∀ (S : ShortComplex C), S.HasHomology attribute [instance] CategoryWithHomology.hasHomology instance [CategoryWithHomology C] : CategoryWithHomology Cᵒᵖ := ⟨fun S => HasHomology.mk' S.unop.homologyData.op⟩ /-- The homology functor `ShortComplex C ⥤ C` for a category `C` with homology. -/ @[simps] noncomputable def homologyFunctor [CategoryWithHomology C] : ShortComplex C ⥤ C where obj S := S.homology map f := homologyMap f variable {C} instance isIso_homologyMap'_of_epi_of_isIso_of_mono (φ : S₁ ⟶ S₂) (h₁ : S₁.HomologyData) (h₂ : S₂.HomologyData) [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : IsIso (homologyMap' φ h₁ h₂) := by dsimp only [homologyMap'] infer_instance lemma isIso_homologyMap_of_epi_of_isIso_of_mono' (φ : S₁ ⟶ S₂) [S₁.HasHomology] [S₂.HasHomology] (h₁ : Epi φ.τ₁) (h₂ : IsIso φ.τ₂) (h₃ : Mono φ.τ₃) : IsIso (homologyMap φ) := by dsimp only [homologyMap] infer_instance instance isIso_homologyMap_of_epi_of_isIso_of_mono (φ : S₁ ⟶ S₂) [S₁.HasHomology] [S₂.HasHomology] [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : IsIso (homologyMap φ) := isIso_homologyMap_of_epi_of_isIso_of_mono' φ inferInstance inferInstance inferInstance instance isIso_homologyFunctor_map_of_epi_of_isIso_of_mono (φ : S₁ ⟶ S₂) [CategoryWithHomology C] [Epi φ.τ₁] [IsIso φ.τ₂] [Mono φ.τ₃] : IsIso ((homologyFunctor C).map φ) := (inferInstance : IsIso (homologyMap φ)) instance isIso_homologyMap_of_isIso (φ : S₁ ⟶ S₂) [S₁.HasHomology] [S₂.HasHomology] [IsIso φ] : IsIso (homologyMap φ) := by dsimp only [homologyMap, homologyMap'] infer_instance section variable (S) {A : C} variable [HasHomology S] /-- The canonical morphism `S.cycles ⟶ S.homology` for a short complex `S` that has homology. -/ noncomputable def homologyπ : S.cycles ⟶ S.homology := S.leftHomologyπ ≫ S.leftHomologyIso.hom /-- The canonical morphism `S.homology ⟶ S.opcycles` for a short complex `S` that has homology. -/ noncomputable def homologyι : S.homology ⟶ S.opcycles := S.rightHomologyIso.inv ≫ S.rightHomologyι @[reassoc (attr := simp)] lemma homologyπ_comp_leftHomologyIso_inv : S.homologyπ ≫ S.leftHomologyIso.inv = S.leftHomologyπ := by dsimp only [homologyπ] simp only [assoc, Iso.hom_inv_id, comp_id] @[reassoc (attr := simp)] lemma rightHomologyIso_hom_comp_homologyι : S.rightHomologyIso.hom ≫ S.homologyι = S.rightHomologyι := by dsimp only [homologyι] simp only [Iso.hom_inv_id_assoc] @[reassoc (attr := simp)] lemma toCycles_comp_homologyπ : S.toCycles ≫ S.homologyπ = 0 := by dsimp only [homologyπ] simp only [toCycles_comp_leftHomologyπ_assoc, zero_comp] @[reassoc (attr := simp)] lemma homologyι_comp_fromOpcycles : S.homologyι ≫ S.fromOpcycles = 0 := by dsimp only [homologyι] simp only [assoc, rightHomologyι_comp_fromOpcycles, comp_zero] /-- The homology `S.homology` of a short complex is the cokernel of the morphism `S.toCycles : S.X₁ ⟶ S.cycles`. -/ noncomputable def homologyIsCokernel : IsColimit (CokernelCofork.ofπ S.homologyπ S.toCycles_comp_homologyπ) := IsColimit.ofIsoColimit S.leftHomologyIsCokernel (Cofork.ext S.leftHomologyIso rfl) /-- The homology `S.homology` of a short complex is the kernel of the morphism `S.fromOpcycles : S.opcycles ⟶ S.X₃`. -/ noncomputable def homologyIsKernel : IsLimit (KernelFork.ofι S.homologyι S.homologyι_comp_fromOpcycles) := IsLimit.ofIsoLimit S.rightHomologyIsKernel (Fork.ext S.rightHomologyIso (by simp)) instance : Epi S.homologyπ := Limits.epi_of_isColimit_cofork (S.homologyIsCokernel) instance : Mono S.homologyι := Limits.mono_of_isLimit_fork (S.homologyIsKernel) /-- Given a morphism `k : S.cycles ⟶ A` such that `S.toCycles ≫ k = 0`, this is the induced morphism `S.homology ⟶ A`. -/ noncomputable def descHomology (k : S.cycles ⟶ A) (hk : S.toCycles ≫ k = 0) : S.homology ⟶ A := S.homologyIsCokernel.desc (CokernelCofork.ofπ k hk) /-- Given a morphism `k : A ⟶ S.opcycles` such that `k ≫ S.fromOpcycles = 0`, this is the induced morphism `A ⟶ S.homology`. -/ noncomputable def liftHomology (k : A ⟶ S.opcycles) (hk : k ≫ S.fromOpcycles = 0) : A ⟶ S.homology := S.homologyIsKernel.lift (KernelFork.ofι k hk) @[reassoc (attr := simp)] lemma π_descHomology (k : S.cycles ⟶ A) (hk : S.toCycles ≫ k = 0) : S.homologyπ ≫ S.descHomology k hk = k := Cofork.IsColimit.π_desc S.homologyIsCokernel @[reassoc (attr := simp)] lemma liftHomology_ι (k : A ⟶ S.opcycles) (hk : k ≫ S.fromOpcycles = 0) : S.liftHomology k hk ≫ S.homologyι = k := Fork.IsLimit.lift_ι S.homologyIsKernel @[reassoc (attr := simp)] lemma homologyπ_naturality (φ : S₁ ⟶ S₂) [S₁.HasHomology] [S₂.HasHomology] : S₁.homologyπ ≫ homologyMap φ = cyclesMap φ ≫ S₂.homologyπ := by simp only [← cancel_mono S₂.leftHomologyIso.inv, assoc, ← leftHomologyIso_inv_naturality φ, homologyπ_comp_leftHomologyIso_inv] simp only [homologyπ, assoc, Iso.hom_inv_id_assoc, leftHomologyπ_naturality] @[reassoc (attr := simp)] lemma homologyι_naturality (φ : S₁ ⟶ S₂) [S₁.HasHomology] [S₂.HasHomology] : homologyMap φ ≫ S₂.homologyι = S₁.homologyι ≫ S₁.opcyclesMap φ := by simp only [← cancel_epi S₁.rightHomologyIso.hom, rightHomologyIso_hom_naturality_assoc φ, rightHomologyIso_hom_comp_homologyι, rightHomologyι_naturality] simp only [homologyι, assoc, Iso.hom_inv_id_assoc] @[reassoc (attr := simp)] lemma homology_π_ι : S.homologyπ ≫ S.homologyι = S.iCycles ≫ S.pOpcycles := by dsimp only [homologyπ, homologyι] simpa only [assoc, S.leftRightHomologyComparison_fac] using S.π_leftRightHomologyComparison_ι /-- The homology of a short complex `S` identifies to the kernel of the induced morphism `cokernel S.f ⟶ S.X₃`. -/ noncomputable def homologyIsoKernelDesc [HasCokernel S.f] [HasKernel (cokernel.desc S.f S.g S.zero)] : S.homology ≅ kernel (cokernel.desc S.f S.g S.zero) := S.rightHomologyIso.symm ≪≫ S.rightHomologyIsoKernelDesc /-- The homology of a short complex `S` identifies to the cokernel of the induced morphism `S.X₁ ⟶ kernel S.g`. -/ noncomputable def homologyIsoCokernelLift [HasKernel S.g] [HasCokernel (kernel.lift S.g S.f S.zero)] : S.homology ≅ cokernel (kernel.lift S.g S.f S.zero) := S.leftHomologyIso.symm ≪≫ S.leftHomologyIsoCokernelLift @[reassoc (attr := simp)] lemma LeftHomologyData.homologyπ_comp_homologyIso_hom (h : S.LeftHomologyData) : S.homologyπ ≫ h.homologyIso.hom = h.cyclesIso.hom ≫ h.π := by dsimp only [homologyπ, homologyIso] simp only [Iso.trans_hom, Iso.symm_hom, assoc, Iso.hom_inv_id_assoc, leftHomologyπ_comp_leftHomologyIso_hom] @[reassoc (attr := simp)] lemma LeftHomologyData.π_comp_homologyIso_inv (h : S.LeftHomologyData) : h.π ≫ h.homologyIso.inv = h.cyclesIso.inv ≫ S.homologyπ := by dsimp only [homologyπ, homologyIso] simp only [Iso.trans_inv, Iso.symm_inv, π_comp_leftHomologyIso_inv_assoc] @[reassoc (attr := simp)] lemma RightHomologyData.homologyIso_inv_comp_homologyι (h : S.RightHomologyData) : h.homologyIso.inv ≫ S.homologyι = h.ι ≫ h.opcyclesIso.inv := by dsimp only [homologyι, homologyIso] simp only [Iso.trans_inv, Iso.symm_inv, assoc, Iso.hom_inv_id_assoc, rightHomologyIso_inv_comp_rightHomologyι] @[reassoc (attr := simp)] lemma RightHomologyData.homologyIso_hom_comp_ι (h : S.RightHomologyData) : h.homologyIso.hom ≫ h.ι = S.homologyι ≫ h.opcyclesIso.hom := by dsimp only [homologyι, homologyIso] simp only [Iso.trans_hom, Iso.symm_hom, assoc, rightHomologyIso_hom_comp_ι] @[reassoc (attr := simp)] lemma LeftHomologyData.homologyIso_hom_comp_leftHomologyIso_inv (h : S.LeftHomologyData) : h.homologyIso.hom ≫ h.leftHomologyIso.inv = S.leftHomologyIso.inv := by dsimp only [homologyIso] simp only [Iso.trans_hom, Iso.symm_hom, assoc, Iso.hom_inv_id, comp_id] @[reassoc (attr := simp)] lemma LeftHomologyData.leftHomologyIso_hom_comp_homologyIso_inv (h : S.LeftHomologyData) : h.leftHomologyIso.hom ≫ h.homologyIso.inv = S.leftHomologyIso.hom := by dsimp only [homologyIso] simp only [Iso.trans_inv, Iso.symm_inv, Iso.hom_inv_id_assoc] @[reassoc (attr := simp)] lemma RightHomologyData.homologyIso_hom_comp_rightHomologyIso_inv (h : S.RightHomologyData) : h.homologyIso.hom ≫ h.rightHomologyIso.inv = S.rightHomologyIso.inv := by dsimp only [homologyIso] simp only [Iso.trans_hom, Iso.symm_hom, assoc, Iso.hom_inv_id, comp_id] @[reassoc (attr := simp)] lemma RightHomologyData.rightHomologyIso_hom_comp_homologyIso_inv (h : S.RightHomologyData) : h.rightHomologyIso.hom ≫ h.homologyIso.inv = S.rightHomologyIso.hom := by dsimp only [homologyIso] simp only [Iso.trans_inv, Iso.symm_inv, Iso.hom_inv_id_assoc] @[reassoc] lemma comp_homologyMap_comp [S₁.HasHomology] [S₂.HasHomology] (φ : S₁ ⟶ S₂) (h₁ : S₁.LeftHomologyData) (h₂ : S₂.RightHomologyData) : h₁.π ≫ h₁.homologyIso.inv ≫ homologyMap φ ≫ h₂.homologyIso.hom ≫ h₂.ι = h₁.i ≫ φ.τ₂ ≫ h₂.p := by dsimp only [LeftHomologyData.homologyIso, RightHomologyData.homologyIso, Iso.symm, Iso.trans, Iso.refl, leftHomologyIso, rightHomologyIso, leftHomologyMapIso', rightHomologyMapIso', LeftHomologyData.cyclesIso, RightHomologyData.opcyclesIso, LeftHomologyData.leftHomologyIso, RightHomologyData.rightHomologyIso, homologyMap, homologyMap'] simp only [assoc, rightHomologyι_naturality', rightHomologyι_naturality'_assoc, leftHomologyπ_naturality'_assoc, HomologyData.comm_assoc, p_opcyclesMap'_assoc, id_τ₂, p_opcyclesMap', id_comp, cyclesMap'_i_assoc] @[reassoc] lemma π_homologyMap_ι [S₁.HasHomology] [S₂.HasHomology] (φ : S₁ ⟶ S₂) : S₁.homologyπ ≫ homologyMap φ ≫ S₂.homologyι = S₁.iCycles ≫ φ.τ₂ ≫ S₂.pOpcycles := by simp only [homologyι_naturality, homology_π_ι_assoc, p_opcyclesMap] end variable (S) /-- The canonical isomorphism `S.op.homology ≅ Opposite.op S.homology` when a short complex `S` has homology. -/ noncomputable def homologyOpIso [S.HasHomology] : S.op.homology ≅ Opposite.op S.homology := S.op.leftHomologyIso.symm ≪≫ S.leftHomologyOpIso ≪≫ S.rightHomologyIso.symm.op lemma homologyMap'_op : (homologyMap' φ h₁ h₂).op = h₂.iso.inv.op ≫ homologyMap' (opMap φ) h₂.op h₁.op ≫ h₁.iso.hom.op := Quiver.Hom.unop_inj (by dsimp have γ : HomologyMapData φ h₁ h₂ := default simp only [γ.homologyMap'_eq, γ.op.homologyMap'_eq, HomologyData.op_left, HomologyMapData.op_left, RightHomologyMapData.op_φH, Quiver.Hom.unop_op, assoc, ← γ.comm_assoc, Iso.hom_inv_id, comp_id]) lemma homologyMap_op [HasHomology S₁] [HasHomology S₂] : (homologyMap φ).op = (S₂.homologyOpIso).inv ≫ homologyMap (opMap φ) ≫ (S₁.homologyOpIso).hom := by dsimp only [homologyMap, homologyOpIso] rw [homologyMap'_op] dsimp only [Iso.symm, Iso.trans, Iso.op, Iso.refl, rightHomologyIso, leftHomologyIso, leftHomologyOpIso, leftHomologyMapIso', rightHomologyMapIso', LeftHomologyData.leftHomologyIso, homologyMap'] simp only [assoc, rightHomologyMap'_op, op_comp, ← leftHomologyMap'_comp_assoc, id_comp, opMap_id, comp_id, HomologyData.op_left] @[reassoc] lemma homologyOpIso_hom_naturality [S₁.HasHomology] [S₂.HasHomology] : homologyMap (opMap φ) ≫ (S₁.homologyOpIso).hom = S₂.homologyOpIso.hom ≫ (homologyMap φ).op := by simp [homologyMap_op] @[reassoc] lemma homologyOpIso_inv_naturality [S₁.HasHomology] [S₂.HasHomology] : (homologyMap φ).op ≫ (S₁.homologyOpIso).inv = S₂.homologyOpIso.inv ≫ homologyMap (opMap φ) := by simp [homologyMap_op] variable (C) /-- The natural isomorphism `(homologyFunctor C).op ≅ opFunctor C ⋙ homologyFunctor Cᵒᵖ` which relates the homology in `C` and in `Cᵒᵖ`. -/ noncomputable def homologyFunctorOpNatIso [CategoryWithHomology C] : (homologyFunctor C).op ≅ opFunctor C ⋙ homologyFunctor Cᵒᵖ := NatIso.ofComponents (fun S => S.unop.homologyOpIso.symm) (fun _ ↦ homologyOpIso_inv_naturality _) variable {C} {A : C} lemma liftCycles_homologyπ_eq_zero_of_boundary [S.HasHomology] (k : A ⟶ S.X₂) (x : A ⟶ S.X₁) (hx : k = x ≫ S.f) : S.liftCycles k (by rw [hx, assoc, S.zero, comp_zero]) ≫ S.homologyπ = 0 := by dsimp only [homologyπ] rw [S.liftCycles_leftHomologyπ_eq_zero_of_boundary_assoc k x hx, zero_comp] @[reassoc] lemma homologyι_descOpcycles_eq_zero_of_boundary [S.HasHomology] (k : S.X₂ ⟶ A) (x : S.X₃ ⟶ A) (hx : k = S.g ≫ x) : S.homologyι ≫ S.descOpcycles k (by rw [hx, S.zero_assoc, zero_comp]) = 0 := by	dsimp only [homologyι] rw [assoc, S.rightHomologyι_descOpcycles_π_eq_zero_of_boundary k x hx, comp_zero] lemma isIso_homologyMap_of_isIso_cyclesMap_of_epi {φ : S₁ ⟶ S₂} [S₁.HasHomology] [S₂.HasHomology] (h₁ : IsIso (cyclesMap φ)) (h₂ : Epi φ.τ₁) : IsIso (homologyMap φ) := by have h : S₂.toCycles ≫ inv (cyclesMap φ) ≫ S₁.homologyπ = 0 := by simp only [← cancel_epi φ.τ₁, ← toCycles_naturality_assoc, IsIso.hom_inv_id_assoc, toCycles_comp_homologyπ, comp_zero] have ⟨z, hz⟩ := CokernelCofork.IsColimit.desc' S₂.homologyIsCokernel _ h dsimp at hz refine ⟨⟨z, ?_, ?_⟩⟩ · rw [← cancel_epi S₁.homologyπ, homologyπ_naturality_assoc, hz,	Mathlib/Algebra/Homology/ShortComplex/Homology.lean	1,071	1,083
/- Copyright (c) 2023 Yaël Dillies. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yaël Dillies -/ import Mathlib.Algebra.NoZeroSMulDivisors.Basic import Mathlib.Algebra.Order.GroupWithZero.Action.Synonym import Mathlib.Tactic.GCongr import Mathlib.Tactic.Positivity.Core /-! # Monotonicity of scalar multiplication by positive elements This file defines typeclasses to reason about monotonicity of the operations * `b ↦ a • b`, "left scalar multiplication" * `a ↦ a • b`, "right scalar multiplication" We use eight typeclasses to encode the various properties we care about for those two operations. These typeclasses are meant to be mostly internal to this file, to set up each lemma in the appropriate generality. Less granular typeclasses like `OrderedAddCommMonoid`, `LinearOrderedField`, `OrderedSMul` should be enough for most purposes, and the system is set up so that they imply the correct granular typeclasses here. If those are enough for you, you may stop reading here! Else, beware that what follows is a bit technical. ## Definitions In all that follows, `α` and `β` are orders which have a `0` and such that `α` acts on `β` by scalar multiplication. Note however that we do not use lawfulness of this action in most of the file. Hence `•` should be considered here as a mostly arbitrary function `α → β → β`. We use the following four typeclasses to reason about left scalar multiplication (`b ↦ a • b`): * `PosSMulMono`: If `a ≥ 0`, then `b₁ ≤ b₂` implies `a • b₁ ≤ a • b₂`. * `PosSMulStrictMono`: If `a > 0`, then `b₁ < b₂` implies `a • b₁ < a • b₂`. * `PosSMulReflectLT`: If `a ≥ 0`, then `a • b₁ < a • b₂` implies `b₁ < b₂`. * `PosSMulReflectLE`: If `a > 0`, then `a • b₁ ≤ a • b₂` implies `b₁ ≤ b₂`. We use the following four typeclasses to reason about right scalar multiplication (`a ↦ a • b`): * `SMulPosMono`: If `b ≥ 0`, then `a₁ ≤ a₂` implies `a₁ • b ≤ a₂ • b`. * `SMulPosStrictMono`: If `b > 0`, then `a₁ < a₂` implies `a₁ • b < a₂ • b`. * `SMulPosReflectLT`: If `b ≥ 0`, then `a₁ • b < a₂ • b` implies `a₁ < a₂`. * `SMulPosReflectLE`: If `b > 0`, then `a₁ • b ≤ a₂ • b` implies `a₁ ≤ a₂`. ## Constructors The four typeclasses about nonnegativity can usually be checked only on positive inputs due to their condition becoming trivial when `a = 0` or `b = 0`. We therefore make the following constructors available: `PosSMulMono.of_pos`, `PosSMulReflectLT.of_pos`, `SMulPosMono.of_pos`, `SMulPosReflectLT.of_pos` ## Implications As `α` and `β` get more and more structure, those typeclasses end up being equivalent. The commonly used implications are: * When `α`, `β` are partial orders: * `PosSMulStrictMono → PosSMulMono` * `SMulPosStrictMono → SMulPosMono` * `PosSMulReflectLE → PosSMulReflectLT` * `SMulPosReflectLE → SMulPosReflectLT` * When `β` is a linear order: * `PosSMulStrictMono → PosSMulReflectLE` * `PosSMulReflectLT → PosSMulMono` (not registered as instance) * `SMulPosReflectLT → SMulPosMono` (not registered as instance) * `PosSMulReflectLE → PosSMulStrictMono` (not registered as instance) * `SMulPosReflectLE → SMulPosStrictMono` (not registered as instance) * When `α` is a linear order: * `SMulPosStrictMono → SMulPosReflectLE` * When `α` is an ordered ring, `β` an ordered group and also an `α`-module: * `PosSMulMono → SMulPosMono` * `PosSMulStrictMono → SMulPosStrictMono` * When `α` is an linear ordered semifield, `β` is an `α`-module: * `PosSMulStrictMono → PosSMulReflectLT` * `PosSMulMono → PosSMulReflectLE` * When `α` is a semiring, `β` is an `α`-module with `NoZeroSMulDivisors`: * `PosSMulMono → PosSMulStrictMono` (not registered as instance) * When `α` is a ring, `β` is an `α`-module with `NoZeroSMulDivisors`: * `SMulPosMono → SMulPosStrictMono` (not registered as instance) Further, the bundled non-granular typeclasses imply the granular ones like so: * `OrderedSMul → PosSMulStrictMono` * `OrderedSMul → PosSMulReflectLT` Unless otherwise stated, all these implications are registered as instances, which means that in practice you should not worry about these implications. However, if you encounter a case where you think a statement is true but not covered by the current implications, please bring it up on Zulip! ## Implementation notes This file uses custom typeclasses instead of abbreviations of `CovariantClass`/`ContravariantClass` because: * They get displayed as classes in the docs. In particular, one can see their list of instances, instead of their instances being invariably dumped to the `CovariantClass`/`ContravariantClass` list. * They don't pollute other typeclass searches. Having many abbreviations of the same typeclass for different purposes always felt like a performance issue (more instances with the same key, for no added benefit), and indeed making the classes here abbreviation previous creates timeouts due to the higher number of `CovariantClass`/`ContravariantClass` instances. * `SMulPosReflectLT`/`SMulPosReflectLE` do not fit in the framework since they relate `≤` on two different types. So we would have to generalise `CovariantClass`/`ContravariantClass` to three types and two relations. * Very minor, but the constructors let you work with `a : α`, `h : 0 ≤ a` instead of `a : {a : α // 0 ≤ a}`. This actually makes some instances surprisingly cleaner to prove. * The `CovariantClass`/`ContravariantClass` framework is only useful to automate very simple logic anyway. It is easily copied over. In the future, it would be good to make the corresponding typeclasses in `Mathlib.Algebra.Order.GroupWithZero.Unbundled` custom typeclasses too. ## TODO This file acts as a substitute for `Mathlib.Algebra.Order.SMul`. We now need to * finish the transition by deleting the duplicate lemmas * rearrange the non-duplicate lemmas into new files * generalise (most of) the lemmas from `Mathlib.Algebra.Order.Module` to here * rethink `OrderedSMul` -/ open OrderDual variable (α β : Type*) section Defs variable [SMul α β] [Preorder α] [Preorder β] section Left variable [Zero α] /-- Typeclass for monotonicity of scalar multiplication by nonnegative elements on the left, namely `b₁ ≤ b₂ → a • b₁ ≤ a • b₂` if `0 ≤ a`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class PosSMulMono : Prop where /-- Do not use this. Use `smul_le_smul_of_nonneg_left` instead. -/ protected elim ⦃a : α⦄ (ha : 0 ≤ a) ⦃b₁ b₂ : β⦄ (hb : b₁ ≤ b₂) : a • b₁ ≤ a • b₂ /-- Typeclass for strict monotonicity of scalar multiplication by positive elements on the left, namely `b₁ < b₂ → a • b₁ < a • b₂` if `0 < a`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class PosSMulStrictMono : Prop where /-- Do not use this. Use `smul_lt_smul_of_pos_left` instead. -/ protected elim ⦃a : α⦄ (ha : 0 < a) ⦃b₁ b₂ : β⦄ (hb : b₁ < b₂) : a • b₁ < a • b₂ /-- Typeclass for strict reverse monotonicity of scalar multiplication by nonnegative elements on the left, namely `a • b₁ < a • b₂ → b₁ < b₂` if `0 ≤ a`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class PosSMulReflectLT : Prop where /-- Do not use this. Use `lt_of_smul_lt_smul_left` instead. -/ protected elim ⦃a : α⦄ (ha : 0 ≤ a) ⦃b₁ b₂ : β⦄ (hb : a • b₁ < a • b₂) : b₁ < b₂ /-- Typeclass for reverse monotonicity of scalar multiplication by positive elements on the left, namely `a • b₁ ≤ a • b₂ → b₁ ≤ b₂` if `0 < a`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class PosSMulReflectLE : Prop where /-- Do not use this. Use `le_of_smul_lt_smul_left` instead. -/ protected elim ⦃a : α⦄ (ha : 0 < a) ⦃b₁ b₂ : β⦄ (hb : a • b₁ ≤ a • b₂) : b₁ ≤ b₂ end Left section Right variable [Zero β] /-- Typeclass for monotonicity of scalar multiplication by nonnegative elements on the left, namely `a₁ ≤ a₂ → a₁ • b ≤ a₂ • b` if `0 ≤ b`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class SMulPosMono : Prop where /-- Do not use this. Use `smul_le_smul_of_nonneg_right` instead. -/ protected elim ⦃b : β⦄ (hb : 0 ≤ b) ⦃a₁ a₂ : α⦄ (ha : a₁ ≤ a₂) : a₁ • b ≤ a₂ • b /-- Typeclass for strict monotonicity of scalar multiplication by positive elements on the left, namely `a₁ < a₂ → a₁ • b < a₂ • b` if `0 < b`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class SMulPosStrictMono : Prop where /-- Do not use this. Use `smul_lt_smul_of_pos_right` instead. -/ protected elim ⦃b : β⦄ (hb : 0 < b) ⦃a₁ a₂ : α⦄ (ha : a₁ < a₂) : a₁ • b < a₂ • b /-- Typeclass for strict reverse monotonicity of scalar multiplication by nonnegative elements on the left, namely `a₁ • b < a₂ • b → a₁ < a₂` if `0 ≤ b`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class SMulPosReflectLT : Prop where /-- Do not use this. Use `lt_of_smul_lt_smul_right` instead. -/ protected elim ⦃b : β⦄ (hb : 0 ≤ b) ⦃a₁ a₂ : α⦄ (hb : a₁ • b < a₂ • b) : a₁ < a₂ /-- Typeclass for reverse monotonicity of scalar multiplication by positive elements on the left, namely `a₁ • b ≤ a₂ • b → a₁ ≤ a₂` if `0 < b`. You should usually not use this very granular typeclass directly, but rather a typeclass like `OrderedSMul`. -/ class SMulPosReflectLE : Prop where /-- Do not use this. Use `le_of_smul_lt_smul_right` instead. -/ protected elim ⦃b : β⦄ (hb : 0 < b) ⦃a₁ a₂ : α⦄ (hb : a₁ • b ≤ a₂ • b) : a₁ ≤ a₂ end Right end Defs variable {α β} {a a₁ a₂ : α} {b b₁ b₂ : β} section Mul variable [Zero α] [Mul α] [Preorder α] -- See note [lower instance priority] instance (priority := 100) PosMulMono.toPosSMulMono [PosMulMono α] : PosSMulMono α α where elim _a ha _b₁ _b₂ hb := mul_le_mul_of_nonneg_left hb ha -- See note [lower instance priority] instance (priority := 100) PosMulStrictMono.toPosSMulStrictMono [PosMulStrictMono α] : PosSMulStrictMono α α where elim _a ha _b₁ _b₂ hb := mul_lt_mul_of_pos_left hb ha -- See note [lower instance priority] instance (priority := 100) PosMulReflectLT.toPosSMulReflectLT [PosMulReflectLT α] : PosSMulReflectLT α α where elim _a ha _b₁ _b₂ h := lt_of_mul_lt_mul_left h ha -- See note [lower instance priority] instance (priority := 100) PosMulReflectLE.toPosSMulReflectLE [PosMulReflectLE α] : PosSMulReflectLE α α where elim _a ha _b₁ _b₂ h := le_of_mul_le_mul_left h ha -- See note [lower instance priority] instance (priority := 100) MulPosMono.toSMulPosMono [MulPosMono α] : SMulPosMono α α where elim _b hb _a₁ _a₂ ha := mul_le_mul_of_nonneg_right ha hb -- See note [lower instance priority] instance (priority := 100) MulPosStrictMono.toSMulPosStrictMono [MulPosStrictMono α] : SMulPosStrictMono α α where elim _b hb _a₁ _a₂ ha := mul_lt_mul_of_pos_right ha hb -- See note [lower instance priority] instance (priority := 100) MulPosReflectLT.toSMulPosReflectLT [MulPosReflectLT α] : SMulPosReflectLT α α where elim _b hb _a₁ _a₂ h := lt_of_mul_lt_mul_right h hb -- See note [lower instance priority] instance (priority := 100) MulPosReflectLE.toSMulPosReflectLE [MulPosReflectLE α] : SMulPosReflectLE α α where elim _b hb _a₁ _a₂ h := le_of_mul_le_mul_right h hb end Mul section SMul variable [SMul α β] section Preorder variable [Preorder α] [Preorder β] section Left variable [Zero α] lemma monotone_smul_left_of_nonneg [PosSMulMono α β] (ha : 0 ≤ a) : Monotone ((a • ·) : β → β) := PosSMulMono.elim ha lemma strictMono_smul_left_of_pos [PosSMulStrictMono α β] (ha : 0 < a) : StrictMono ((a • ·) : β → β) := PosSMulStrictMono.elim ha @[gcongr] lemma smul_le_smul_of_nonneg_left [PosSMulMono α β] (hb : b₁ ≤ b₂) (ha : 0 ≤ a) : a • b₁ ≤ a • b₂ := monotone_smul_left_of_nonneg ha hb @[gcongr] lemma smul_lt_smul_of_pos_left [PosSMulStrictMono α β] (hb : b₁ < b₂) (ha : 0 < a) : a • b₁ < a • b₂ := strictMono_smul_left_of_pos ha hb lemma lt_of_smul_lt_smul_left [PosSMulReflectLT α β] (h : a • b₁ < a • b₂) (ha : 0 ≤ a) : b₁ < b₂ := PosSMulReflectLT.elim ha h lemma le_of_smul_le_smul_left [PosSMulReflectLE α β] (h : a • b₁ ≤ a • b₂) (ha : 0 < a) : b₁ ≤ b₂ := PosSMulReflectLE.elim ha h alias lt_of_smul_lt_smul_of_nonneg_left := lt_of_smul_lt_smul_left alias le_of_smul_le_smul_of_pos_left := le_of_smul_le_smul_left @[simp] lemma smul_le_smul_iff_of_pos_left [PosSMulMono α β] [PosSMulReflectLE α β] (ha : 0 < a) : a • b₁ ≤ a • b₂ ↔ b₁ ≤ b₂ := ⟨fun h ↦ le_of_smul_le_smul_left h ha, fun h ↦ smul_le_smul_of_nonneg_left h ha.le⟩ @[simp] lemma smul_lt_smul_iff_of_pos_left [PosSMulStrictMono α β] [PosSMulReflectLT α β] (ha : 0 < a) : a • b₁ < a • b₂ ↔ b₁ < b₂ := ⟨fun h ↦ lt_of_smul_lt_smul_left h ha.le, fun hb ↦ smul_lt_smul_of_pos_left hb ha⟩ end Left section Right variable [Zero β] lemma monotone_smul_right_of_nonneg [SMulPosMono α β] (hb : 0 ≤ b) : Monotone ((· • b) : α → β) := SMulPosMono.elim hb lemma strictMono_smul_right_of_pos [SMulPosStrictMono α β] (hb : 0 < b) : StrictMono ((· • b) : α → β) := SMulPosStrictMono.elim hb @[gcongr] lemma smul_le_smul_of_nonneg_right [SMulPosMono α β] (ha : a₁ ≤ a₂) (hb : 0 ≤ b) : a₁ • b ≤ a₂ • b := monotone_smul_right_of_nonneg hb ha @[gcongr] lemma smul_lt_smul_of_pos_right [SMulPosStrictMono α β] (ha : a₁ < a₂) (hb : 0 < b) : a₁ • b < a₂ • b := strictMono_smul_right_of_pos hb ha lemma lt_of_smul_lt_smul_right [SMulPosReflectLT α β] (h : a₁ • b < a₂ • b) (hb : 0 ≤ b) : a₁ < a₂ := SMulPosReflectLT.elim hb h lemma le_of_smul_le_smul_right [SMulPosReflectLE α β] (h : a₁ • b ≤ a₂ • b) (hb : 0 < b) : a₁ ≤ a₂ := SMulPosReflectLE.elim hb h alias lt_of_smul_lt_smul_of_nonneg_right := lt_of_smul_lt_smul_right alias le_of_smul_le_smul_of_pos_right := le_of_smul_le_smul_right @[simp] lemma smul_le_smul_iff_of_pos_right [SMulPosMono α β] [SMulPosReflectLE α β] (hb : 0 < b) : a₁ • b ≤ a₂ • b ↔ a₁ ≤ a₂ := ⟨fun h ↦ le_of_smul_le_smul_right h hb, fun ha ↦ smul_le_smul_of_nonneg_right ha hb.le⟩ @[simp] lemma smul_lt_smul_iff_of_pos_right [SMulPosStrictMono α β] [SMulPosReflectLT α β] (hb : 0 < b) : a₁ • b < a₂ • b ↔ a₁ < a₂ := ⟨fun h ↦ lt_of_smul_lt_smul_right h hb.le, fun ha ↦ smul_lt_smul_of_pos_right ha hb⟩ end Right section LeftRight variable [Zero α] [Zero β] lemma smul_lt_smul_of_le_of_lt [PosSMulStrictMono α β] [SMulPosMono α β] (ha : a₁ ≤ a₂) (hb : b₁ < b₂) (h₁ : 0 < a₁) (h₂ : 0 ≤ b₂) : a₁ • b₁ < a₂ • b₂ := (smul_lt_smul_of_pos_left hb h₁).trans_le (smul_le_smul_of_nonneg_right ha h₂) lemma smul_lt_smul_of_le_of_lt' [PosSMulStrictMono α β] [SMulPosMono α β] (ha : a₁ ≤ a₂) (hb : b₁ < b₂) (h₂ : 0 < a₂) (h₁ : 0 ≤ b₁) : a₁ • b₁ < a₂ • b₂ := (smul_le_smul_of_nonneg_right ha h₁).trans_lt (smul_lt_smul_of_pos_left hb h₂) lemma smul_lt_smul_of_lt_of_le [PosSMulMono α β] [SMulPosStrictMono α β] (ha : a₁ < a₂) (hb : b₁ ≤ b₂) (h₁ : 0 ≤ a₁) (h₂ : 0 < b₂) : a₁ • b₁ < a₂ • b₂ := (smul_le_smul_of_nonneg_left hb h₁).trans_lt (smul_lt_smul_of_pos_right ha h₂) lemma smul_lt_smul_of_lt_of_le' [PosSMulMono α β] [SMulPosStrictMono α β] (ha : a₁ < a₂) (hb : b₁ ≤ b₂) (h₂ : 0 ≤ a₂) (h₁ : 0 < b₁) : a₁ • b₁ < a₂ • b₂ := (smul_lt_smul_of_pos_right ha h₁).trans_le (smul_le_smul_of_nonneg_left hb h₂) lemma smul_lt_smul [PosSMulStrictMono α β] [SMulPosStrictMono α β] (ha : a₁ < a₂) (hb : b₁ < b₂) (h₁ : 0 < a₁) (h₂ : 0 < b₂) : a₁ • b₁ < a₂ • b₂ := (smul_lt_smul_of_pos_left hb h₁).trans (smul_lt_smul_of_pos_right ha h₂) lemma smul_lt_smul' [PosSMulStrictMono α β] [SMulPosStrictMono α β] (ha : a₁ < a₂) (hb : b₁ < b₂) (h₂ : 0 < a₂) (h₁ : 0 < b₁) : a₁ • b₁ < a₂ • b₂ := (smul_lt_smul_of_pos_right ha h₁).trans (smul_lt_smul_of_pos_left hb h₂) lemma smul_le_smul [PosSMulMono α β] [SMulPosMono α β] (ha : a₁ ≤ a₂) (hb : b₁ ≤ b₂) (h₁ : 0 ≤ a₁) (h₂ : 0 ≤ b₂) : a₁ • b₁ ≤ a₂ • b₂ := (smul_le_smul_of_nonneg_left hb h₁).trans (smul_le_smul_of_nonneg_right ha h₂) lemma smul_le_smul' [PosSMulMono α β] [SMulPosMono α β] (ha : a₁ ≤ a₂) (hb : b₁ ≤ b₂) (h₂ : 0 ≤ a₂) (h₁ : 0 ≤ b₁) : a₁ • b₁ ≤ a₂ • b₂ := (smul_le_smul_of_nonneg_right ha h₁).trans (smul_le_smul_of_nonneg_left hb h₂) end LeftRight end Preorder section LinearOrder variable [Preorder α] [LinearOrder β] section Left variable [Zero α] -- See note [lower instance priority] instance (priority := 100) PosSMulStrictMono.toPosSMulReflectLE [PosSMulStrictMono α β] : PosSMulReflectLE α β where elim _a ha _b₁ _b₂ := (strictMono_smul_left_of_pos ha).le_iff_le.1 lemma PosSMulReflectLE.toPosSMulStrictMono [PosSMulReflectLE α β] : PosSMulStrictMono α β where elim _a ha _b₁ _b₂ hb := not_le.1 fun h ↦ hb.not_le <\| le_of_smul_le_smul_left h ha lemma posSMulStrictMono_iff_PosSMulReflectLE : PosSMulStrictMono α β ↔ PosSMulReflectLE α β := ⟨fun _ ↦ inferInstance, fun _ ↦ PosSMulReflectLE.toPosSMulStrictMono⟩ instance PosSMulMono.toPosSMulReflectLT [PosSMulMono α β] : PosSMulReflectLT α β where elim _a ha _b₁ _b₂ := (monotone_smul_left_of_nonneg ha).reflect_lt lemma PosSMulReflectLT.toPosSMulMono [PosSMulReflectLT α β] : PosSMulMono α β where elim _a ha _b₁ _b₂ hb := not_lt.1 fun h ↦ hb.not_lt <\| lt_of_smul_lt_smul_left h ha lemma posSMulMono_iff_posSMulReflectLT : PosSMulMono α β ↔ PosSMulReflectLT α β := ⟨fun _ ↦ PosSMulMono.toPosSMulReflectLT, fun _ ↦ PosSMulReflectLT.toPosSMulMono⟩ lemma smul_max_of_nonneg [PosSMulMono α β] (ha : 0 ≤ a) (b₁ b₂ : β) : a • max b₁ b₂ = max (a • b₁) (a • b₂) := (monotone_smul_left_of_nonneg ha).map_max lemma smul_min_of_nonneg [PosSMulMono α β] (ha : 0 ≤ a) (b₁ b₂ : β) : a • min b₁ b₂ = min (a • b₁) (a • b₂) := (monotone_smul_left_of_nonneg ha).map_min end Left section Right variable [Zero β] lemma SMulPosReflectLE.toSMulPosStrictMono [SMulPosReflectLE α β] : SMulPosStrictMono α β where elim _b hb _a₁ _a₂ ha := not_le.1 fun h ↦ ha.not_le <\| le_of_smul_le_smul_of_pos_right h hb lemma SMulPosReflectLT.toSMulPosMono [SMulPosReflectLT α β] : SMulPosMono α β where elim _b hb _a₁ _a₂ ha := not_lt.1 fun h ↦ ha.not_lt <\| lt_of_smul_lt_smul_right h hb end Right end LinearOrder section LinearOrder variable [LinearOrder α] [Preorder β] section Right variable [Zero β] -- See note [lower instance priority] instance (priority := 100) SMulPosStrictMono.toSMulPosReflectLE [SMulPosStrictMono α β] : SMulPosReflectLE α β where elim _b hb _a₁ _a₂ h := not_lt.1 fun ha ↦ h.not_lt <\| smul_lt_smul_of_pos_right ha hb lemma SMulPosMono.toSMulPosReflectLT [SMulPosMono α β] : SMulPosReflectLT α β where elim _b hb _a₁ _a₂ h := not_le.1 fun ha ↦ h.not_le <\| smul_le_smul_of_nonneg_right ha hb end Right end LinearOrder section LinearOrder variable [LinearOrder α] [LinearOrder β] section Right variable [Zero β] lemma smulPosStrictMono_iff_SMulPosReflectLE : SMulPosStrictMono α β ↔ SMulPosReflectLE α β := ⟨fun _ ↦ SMulPosStrictMono.toSMulPosReflectLE, fun _ ↦ SMulPosReflectLE.toSMulPosStrictMono⟩ lemma smulPosMono_iff_smulPosReflectLT : SMulPosMono α β ↔ SMulPosReflectLT α β := ⟨fun _ ↦ SMulPosMono.toSMulPosReflectLT, fun _ ↦ SMulPosReflectLT.toSMulPosMono⟩ end Right end LinearOrder end SMul section SMulZeroClass variable [Zero α] [Zero β] [SMulZeroClass α β] section Preorder variable [Preorder α] [Preorder β] lemma smul_pos [PosSMulStrictMono α β] (ha : 0 < a) (hb : 0 < b) : 0 < a • b := by simpa only [smul_zero] using smul_lt_smul_of_pos_left hb ha lemma smul_neg_of_pos_of_neg [PosSMulStrictMono α β] (ha : 0 < a) (hb : b < 0) : a • b < 0 := by simpa only [smul_zero] using smul_lt_smul_of_pos_left hb ha @[simp] lemma smul_pos_iff_of_pos_left [PosSMulStrictMono α β] [PosSMulReflectLT α β] (ha : 0 < a) : 0 < a • b ↔ 0 < b := by simpa only [smul_zero] using smul_lt_smul_iff_of_pos_left ha (b₁ := 0) (b₂ := b) lemma smul_neg_iff_of_pos_left [PosSMulStrictMono α β] [PosSMulReflectLT α β] (ha : 0 < a) : a • b < 0 ↔ b < 0 := by simpa only [smul_zero] using smul_lt_smul_iff_of_pos_left ha (b₂ := (0 : β)) lemma smul_nonneg [PosSMulMono α β] (ha : 0 ≤ a) (hb : 0 ≤ b₁) : 0 ≤ a • b₁ := by simpa only [smul_zero] using smul_le_smul_of_nonneg_left hb ha lemma smul_nonpos_of_nonneg_of_nonpos [PosSMulMono α β] (ha : 0 ≤ a) (hb : b ≤ 0) : a • b ≤ 0 := by simpa only [smul_zero] using smul_le_smul_of_nonneg_left hb ha lemma pos_of_smul_pos_left [PosSMulReflectLT α β] (h : 0 < a • b) (ha : 0 ≤ a) : 0 < b := lt_of_smul_lt_smul_left (by rwa [smul_zero]) ha lemma neg_of_smul_neg_left [PosSMulReflectLT α β] (h : a • b < 0) (ha : 0 ≤ a) : b < 0 := lt_of_smul_lt_smul_left (by rwa [smul_zero]) ha end Preorder end SMulZeroClass section SMulWithZero variable [Zero α] [Zero β] [SMulWithZero α β] section Preorder variable [Preorder α] [Preorder β] lemma smul_pos' [SMulPosStrictMono α β] (ha : 0 < a) (hb : 0 < b) : 0 < a • b := by simpa only [zero_smul] using smul_lt_smul_of_pos_right ha hb lemma smul_neg_of_neg_of_pos [SMulPosStrictMono α β] (ha : a < 0) (hb : 0 < b) : a • b < 0 := by simpa only [zero_smul] using smul_lt_smul_of_pos_right ha hb @[simp] lemma smul_pos_iff_of_pos_right [SMulPosStrictMono α β] [SMulPosReflectLT α β] (hb : 0 < b) : 0 < a • b ↔ 0 < a := by simpa only [zero_smul] using smul_lt_smul_iff_of_pos_right hb (a₁ := 0) (a₂ := a) lemma smul_nonneg' [SMulPosMono α β] (ha : 0 ≤ a) (hb : 0 ≤ b₁) : 0 ≤ a • b₁ := by simpa only [zero_smul] using smul_le_smul_of_nonneg_right ha hb lemma smul_nonpos_of_nonpos_of_nonneg [SMulPosMono α β] (ha : a ≤ 0) (hb : 0 ≤ b) : a • b ≤ 0 := by simpa only [zero_smul] using smul_le_smul_of_nonneg_right ha hb lemma pos_of_smul_pos_right [SMulPosReflectLT α β] (h : 0 < a • b) (hb : 0 ≤ b) : 0 < a := lt_of_smul_lt_smul_right (by rwa [zero_smul]) hb lemma neg_of_smul_neg_right [SMulPosReflectLT α β] (h : a • b < 0) (hb : 0 ≤ b) : a < 0 := lt_of_smul_lt_smul_right (by rwa [zero_smul]) hb lemma pos_iff_pos_of_smul_pos [PosSMulReflectLT α β] [SMulPosReflectLT α β] (hab : 0 < a • b) : 0 < a ↔ 0 < b := ⟨pos_of_smul_pos_left hab ∘ le_of_lt, pos_of_smul_pos_right hab ∘ le_of_lt⟩ end Preorder section PartialOrder variable [PartialOrder α] [Preorder β] /-- A constructor for `PosSMulMono` requiring you to prove `b₁ ≤ b₂ → a • b₁ ≤ a • b₂` only when `0 < a` -/ lemma PosSMulMono.of_pos (h₀ : ∀ a : α, 0 < a → ∀ b₁ b₂ : β, b₁ ≤ b₂ → a • b₁ ≤ a • b₂) : PosSMulMono α β where elim a ha b₁ b₂ h := by obtain ha \| ha := ha.eq_or_lt · simp [← ha] · exact h₀ _ ha _ _ h /-- A constructor for `PosSMulReflectLT` requiring you to prove `a • b₁ < a • b₂ → b₁ < b₂` only when `0 < a` -/ lemma PosSMulReflectLT.of_pos (h₀ : ∀ a : α, 0 < a → ∀ b₁ b₂ : β, a • b₁ < a • b₂ → b₁ < b₂) : PosSMulReflectLT α β where elim a ha b₁ b₂ h := by obtain ha \| ha := ha.eq_or_lt · simp [← ha] at h · exact h₀ _ ha _ _ h	end PartialOrder section PartialOrder variable [Preorder α] [PartialOrder β] /-- A constructor for `SMulPosMono` requiring you to prove `a₁ ≤ a₂ → a₁ • b ≤ a₂ • b` only when `0 < b` -/ lemma SMulPosMono.of_pos (h₀ : ∀ b : β, 0 < b → ∀ a₁ a₂ : α, a₁ ≤ a₂ → a₁ • b ≤ a₂ • b) :	Mathlib/Algebra/Order/Module/Defs.lean	542	549
/- Copyright (c) 2020 Markus Himmel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Markus Himmel, Adam Topaz, Johan Commelin, Jakob von Raumer -/ import Mathlib.Algebra.Homology.ImageToKernel import Mathlib.Algebra.Homology.ShortComplex.Exact import Mathlib.CategoryTheory.Abelian.Opposite import Mathlib.CategoryTheory.Limits.Preserves.Shapes.Zero import Mathlib.CategoryTheory.Limits.Preserves.Shapes.Kernels import Mathlib.CategoryTheory.Adjunction.Limits import Mathlib.Tactic.TFAE /-! # Exact sequences in abelian categories In an abelian category, we get several interesting results related to exactness which are not true in more general settings. ## Main results * A short complex `S` is exact iff `imageSubobject S.f = kernelSubobject S.g`. * If `(f, g)` is exact, then `image.ι f` has the universal property of the kernel of `g`. * `f` is a monomorphism iff `kernel.ι f = 0` iff `Exact 0 f`, and `f` is an epimorphism iff `cokernel.π = 0` iff `Exact f 0`. * A faithful functor between abelian categories that preserves zero morphisms reflects exact sequences. * `X ⟶ Y ⟶ Z ⟶ 0` is exact if and only if the second map is a cokernel of the first, and `0 ⟶ X ⟶ Y ⟶ Z` is exact if and only if the first map is a kernel of the second. * A functor `F` such that for all `S`, we have `S.Exact → (S.map F).Exact` preserves both finite limits and colimits. -/ universe v₁ v₂ u₁ u₂ noncomputable section open CategoryTheory Limits Preadditive variable {C : Type u₁} [Category.{v₁} C] [Abelian C] namespace CategoryTheory namespace ShortComplex variable (S : ShortComplex C) attribute [local instance] hasEqualizers_of_hasKernels theorem exact_iff_epi_imageToKernel' : S.Exact ↔ Epi (imageToKernel' S.f S.g S.zero) := by rw [S.exact_iff_epi_kernel_lift] have : factorThruImage S.f ≫ imageToKernel' S.f S.g S.zero = kernel.lift S.g S.f S.zero := by simp only [← cancel_mono (kernel.ι _), kernel.lift_ι, imageToKernel', Category.assoc, image.fac] constructor · intro exact epi_of_epi_fac this · intro rw [← this] apply epi_comp theorem exact_iff_epi_imageToKernel : S.Exact ↔ Epi (imageToKernel S.f S.g S.zero) := by rw [S.exact_iff_epi_imageToKernel'] apply (MorphismProperty.epimorphisms C).arrow_mk_iso_iff exact Arrow.isoMk (imageSubobjectIso S.f).symm (kernelSubobjectIso S.g).symm theorem exact_iff_isIso_imageToKernel : S.Exact ↔ IsIso (imageToKernel S.f S.g S.zero) := by rw [S.exact_iff_epi_imageToKernel] constructor · intro apply isIso_of_mono_of_epi · intro infer_instance /-- In an abelian category, a short complex `S` is exact iff `imageSubobject S.f = kernelSubobject S.g`. -/ theorem exact_iff_image_eq_kernel : S.Exact ↔ imageSubobject S.f = kernelSubobject S.g := by rw [exact_iff_isIso_imageToKernel] constructor · intro exact Subobject.eq_of_comm (asIso (imageToKernel _ _ S.zero)) (by simp) · intro h exact ⟨Subobject.ofLE _ _ h.ge, by ext; simp, by ext; simp⟩ theorem exact_iff_of_forks {cg : KernelFork S.g} (hg : IsLimit cg) {cf : CokernelCofork S.f} (hf : IsColimit cf) : S.Exact ↔ cg.ι ≫ cf.π = 0 := by rw [exact_iff_kernel_ι_comp_cokernel_π_zero] let e₁ := IsLimit.conePointUniqueUpToIso (kernelIsKernel S.g) hg let e₂ := IsColimit.coconePointUniqueUpToIso (cokernelIsCokernel S.f) hf have : cg.ι ≫ cf.π = e₁.inv ≫ kernel.ι S.g ≫ cokernel.π S.f ≫ e₂.hom := by have eq₁ := IsLimit.conePointUniqueUpToIso_inv_comp (kernelIsKernel S.g) hg (.zero) have eq₂ := IsColimit.comp_coconePointUniqueUpToIso_hom (cokernelIsCokernel S.f) hf (.one) dsimp at eq₁ eq₂ rw [← eq₁, ← eq₂, Category.assoc] rw [this, IsIso.comp_left_eq_zero e₁.inv, ← Category.assoc, IsIso.comp_right_eq_zero _ e₂.hom] variable {S} /-- If `(f, g)` is exact, then `Abelian.image.ι S.f` is a kernel of `S.g`. -/ def Exact.isLimitImage (h : S.Exact) : IsLimit (KernelFork.ofι (Abelian.image.ι S.f) (Abelian.image_ι_comp_eq_zero S.zero) : KernelFork S.g) := by rw [exact_iff_kernel_ι_comp_cokernel_π_zero] at h exact KernelFork.IsLimit.ofι _ _ (fun u hu ↦ kernel.lift (cokernel.π S.f) u (by rw [← kernel.lift_ι S.g u hu, Category.assoc, h, comp_zero])) (by simp) (fun _ _ _ hm => by rw [← cancel_mono (Abelian.image.ι S.f), hm, kernel.lift_ι]) /-- If `(f, g)` is exact, then `image.ι f` is a kernel of `g`. -/ def Exact.isLimitImage' (h : S.Exact) : IsLimit (KernelFork.ofι (Limits.image.ι S.f) (image_ι_comp_eq_zero S.zero) : KernelFork S.g) := IsKernel.isoKernel _ _ h.isLimitImage (Abelian.imageIsoImage S.f).symm <\| IsImage.lift_fac _ _ /-- If `(f, g)` is exact, then `Abelian.coimage.π g` is a cokernel of `f`. -/ def Exact.isColimitCoimage (h : S.Exact) : IsColimit (CokernelCofork.ofπ (Abelian.coimage.π S.g) (Abelian.comp_coimage_π_eq_zero S.zero) : CokernelCofork S.f) := by rw [exact_iff_kernel_ι_comp_cokernel_π_zero] at h refine CokernelCofork.IsColimit.ofπ _ _ (fun u hu => cokernel.desc (kernel.ι S.g) u (by rw [← cokernel.π_desc S.f u hu, ← Category.assoc, h, zero_comp])) (by simp) ?_ intros _ _ _ _ hm ext rw [hm, cokernel.π_desc] /-- If `(f, g)` is exact, then `factorThruImage g` is a cokernel of `f`. -/ def Exact.isColimitImage (h : S.Exact) : IsColimit (CokernelCofork.ofπ (Limits.factorThruImage S.g) (comp_factorThruImage_eq_zero S.zero)) := IsCokernel.cokernelIso _ _ h.isColimitCoimage (Abelian.coimageIsoImage' S.g) <\| (cancel_mono (Limits.image.ι S.g)).1 <\| by simp theorem exact_kernel {X Y : C} (f : X ⟶ Y) : (ShortComplex.mk (kernel.ι f) f (by simp)).Exact := exact_of_f_is_kernel _ (kernelIsKernel f) theorem exact_cokernel {X Y : C} (f : X ⟶ Y) : (ShortComplex.mk f (cokernel.π f) (by simp)).Exact := exact_of_g_is_cokernel _ (cokernelIsCokernel f) variable (S) theorem exact_iff_exact_image_ι : S.Exact ↔ (ShortComplex.mk (Abelian.image.ι S.f) S.g (Abelian.image_ι_comp_eq_zero S.zero)).Exact := ShortComplex.exact_iff_of_epi_of_isIso_of_mono { τ₁ := Abelian.factorThruImage S.f τ₂ := 𝟙 _ τ₃ := 𝟙 _ } theorem exact_iff_exact_coimage_π : S.Exact ↔ (ShortComplex.mk S.f (Abelian.coimage.π S.g) (Abelian.comp_coimage_π_eq_zero S.zero)).Exact := by symm exact ShortComplex.exact_iff_of_epi_of_isIso_of_mono { τ₁ := 𝟙 _ τ₂ := 𝟙 _ τ₃ := Abelian.factorThruCoimage S.g } end ShortComplex section open List in theorem Abelian.tfae_mono {X Y : C} (f : X ⟶ Y) (Z : C) : TFAE [Mono f, kernel.ι f = 0, (ShortComplex.mk (0 : Z ⟶ X) f zero_comp).Exact] := by tfae_have 2 → 1 := mono_of_kernel_ι_eq_zero _ tfae_have 1 → 2 \| _ => by rw [← cancel_mono f, kernel.condition, zero_comp] tfae_have 3 ↔ 1 := ShortComplex.exact_iff_mono _ (by simp) tfae_finish open List in theorem Abelian.tfae_epi {X Y : C} (f : X ⟶ Y) (Z : C) : TFAE [Epi f, cokernel.π f = 0, (ShortComplex.mk f (0 : Y ⟶ Z) comp_zero).Exact] := by tfae_have 2 → 1 := epi_of_cokernel_π_eq_zero _ tfae_have 1 → 2 \| _ => by rw [← cancel_epi f, cokernel.condition, comp_zero]	tfae_have 3 ↔ 1 := ShortComplex.exact_iff_epi _ (by simp) tfae_finish end	Mathlib/CategoryTheory/Abelian/Exact.lean	184	188
/- Copyright (c) 2017 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Data.Finite.Defs import Mathlib.Data.Finset.BooleanAlgebra import Mathlib.Data.Finset.Image import Mathlib.Data.Fintype.Defs import Mathlib.Data.Fintype.OfMap import Mathlib.Data.Fintype.Sets import Mathlib.Data.List.FinRange /-! # Instances for finite types This file is a collection of basic `Fintype` instances for types such as `Fin`, `Prod` and pi types. -/ assert_not_exists Monoid open Function open Nat universe u v variable {α β γ : Type} open Finset instance Fin.fintype (n : ℕ) : Fintype (Fin n) := ⟨⟨List.finRange n, List.nodup_finRange n⟩, List.mem_finRange⟩ theorem Fin.univ_def (n : ℕ) : (univ : Finset (Fin n)) = ⟨List.finRange n, List.nodup_finRange n⟩ := rfl theorem Finset.val_univ_fin (n : ℕ) : (Finset.univ : Finset (Fin n)).val = List.finRange n := rfl /-- See also `nonempty_encodable`, `nonempty_denumerable`. -/ theorem nonempty_fintype (α : Type) [Finite α] : Nonempty (Fintype α) := by rcases Finite.exists_equiv_fin α with ⟨n, ⟨e⟩⟩ exact ⟨.ofEquiv _ e.symm⟩ @[simp] theorem List.toFinset_finRange (n : ℕ) : (List.finRange n).toFinset = Finset.univ := by ext; simp @[simp] theorem Fin.univ_val_map {n : ℕ} (f : Fin n → α) : Finset.univ.val.map f = List.ofFn f := by simp [List.ofFn_eq_map, univ_def] theorem Fin.univ_image_def {n : ℕ} [DecidableEq α] (f : Fin n → α) : Finset.univ.image f = (List.ofFn f).toFinset := by simp [Finset.image] theorem Fin.univ_map_def {n : ℕ} (f : Fin n ↪ α) : Finset.univ.map f = ⟨List.ofFn f, List.nodup_ofFn.mpr f.injective⟩ := by simp [Finset.map] @[simp] theorem Fin.image_succAbove_univ {n : ℕ} (i : Fin (n + 1)) : univ.image i.succAbove = {i}ᶜ := by ext m simp @[simp] theorem Fin.image_succ_univ (n : ℕ) : (univ : Finset (Fin n)).image Fin.succ = {0}ᶜ := by rw [← Fin.succAbove_zero, Fin.image_succAbove_univ] @[simp] theorem Fin.image_castSucc (n : ℕ) : (univ : Finset (Fin n)).image Fin.castSucc = {Fin.last n}ᶜ := by rw [← Fin.succAbove_last, Fin.image_succAbove_univ] /- The following three lemmas use `Finset.cons` instead of `insert` and `Finset.map` instead of `Finset.image` to reduce proof obligations downstream. -/ /-- Embed `Fin n` into `Fin (n + 1)` by prepending zero to the `univ` -/ theorem Fin.univ_succ (n : ℕ) : (univ : Finset (Fin (n + 1))) = Finset.cons 0 (univ.map ⟨Fin.succ, Fin.succ_injective _⟩) (by simp [map_eq_image]) := by simp [map_eq_image] /-- Embed `Fin n` into `Fin (n + 1)` by appending a new `Fin.last n` to the `univ` -/ theorem Fin.univ_castSuccEmb (n : ℕ) : (univ : Finset (Fin (n + 1))) = Finset.cons (Fin.last n) (univ.map Fin.castSuccEmb) (by simp [map_eq_image]) := by simp [map_eq_image] /-- Embed `Fin n` into `Fin (n + 1)` by inserting around a specified pivot `p : Fin (n + 1)` into the `univ` -/ theorem Fin.univ_succAbove (n : ℕ) (p : Fin (n + 1)) : (univ : Finset (Fin (n + 1))) = Finset.cons p (univ.map <\| Fin.succAboveEmb p) (by simp) := by simp [map_eq_image] @[simp] theorem Fin.univ_image_get [DecidableEq α] (l : List α) : Finset.univ.image l.get = l.toFinset := by simp [univ_image_def] @[simp] theorem Fin.univ_image_getElem' [DecidableEq β] (l : List α) (f : α → β) : Finset.univ.image (fun i : Fin l.length => f <\| l[(i : Nat)]) = (l.map f).toFinset := by simp only [univ_image_def, List.ofFn_getElem_eq_map] theorem Fin.univ_image_get' [DecidableEq β] (l : List α) (f : α → β) : Finset.univ.image (f <\| l.get ·) = (l.map f).toFinset := by simp @[instance] def Unique.fintype {α : Type} [Unique α] : Fintype α := Fintype.ofSubsingleton default /-- Short-circuit instance to decrease search for `Unique.fintype`, since that relies on a subsingleton elimination for `Unique`. -/ instance Fintype.subtypeEq (y : α) : Fintype { x // x = y } := Fintype.subtype {y} (by simp) /-- Short-circuit instance to decrease search for `Unique.fintype`, since that relies on a subsingleton elimination for `Unique`. -/ instance Fintype.subtypeEq' (y : α) : Fintype { x // y = x } := Fintype.subtype {y} (by simp [eq_comm]) theorem Fintype.univ_empty : @univ Empty _ = ∅ := rfl theorem Fintype.univ_pempty : @univ PEmpty _ = ∅ := rfl instance Unit.fintype : Fintype Unit := Fintype.ofSubsingleton () theorem Fintype.univ_unit : @univ Unit _ = {()} := rfl instance PUnit.fintype : Fintype PUnit := Fintype.ofSubsingleton PUnit.unit theorem Fintype.univ_punit : @univ PUnit _ = {PUnit.unit} := rfl @[simp] theorem Fintype.univ_bool : @univ Bool _ = {true, false} := rfl /-- Given that `α × β` is a fintype, `α` is also a fintype. -/ def Fintype.prodLeft {α β} [DecidableEq α] [Fintype (α × β)] [Nonempty β] : Fintype α := ⟨(@univ (α × β) _).image Prod.fst, fun a => by simp⟩ /-- Given that `α × β` is a fintype, `β` is also a fintype. -/ def Fintype.prodRight {α β} [DecidableEq β] [Fintype (α × β)] [Nonempty α] : Fintype β := ⟨(@univ (α × β) _).image Prod.snd, fun b => by simp⟩ instance ULift.fintype (α : Type) [Fintype α] : Fintype (ULift α) := Fintype.ofEquiv _ Equiv.ulift.symm instance PLift.fintype (α : Type) [Fintype α] : Fintype (PLift α) := Fintype.ofEquiv _ Equiv.plift.symm instance PLift.fintypeProp (p : Prop) [Decidable p] : Fintype (PLift p) := ⟨if h : p then {⟨h⟩} else ∅, fun ⟨h⟩ => by simp [h]⟩ instance Quotient.fintype [Fintype α] (s : Setoid α) [DecidableRel ((· ≈ ·) : α → α → Prop)] : Fintype (Quotient s) := Fintype.ofSurjective Quotient.mk'' Quotient.mk''_surjective instance PSigma.fintypePropLeft {α : Prop} {β : α → Type} [Decidable α] [∀ a, Fintype (β a)] : Fintype (Σ'a, β a) := if h : α then Fintype.ofEquiv (β h) ⟨fun x => ⟨h, x⟩, PSigma.snd, fun _ => rfl, fun ⟨_, _⟩ => rfl⟩ else ⟨∅, fun x => (h x.1).elim⟩ instance PSigma.fintypePropRight {α : Type} {β : α → Prop} [∀ a, Decidable (β a)] [Fintype α] : Fintype (Σ'a, β a) := Fintype.ofEquiv { a // β a } ⟨fun ⟨x, y⟩ => ⟨x, y⟩, fun ⟨x, y⟩ => ⟨x, y⟩, fun ⟨_, _⟩ => rfl, fun ⟨_, _⟩ => rfl⟩ instance PSigma.fintypePropProp {α : Prop} {β : α → Prop} [Decidable α] [∀ a, Decidable (β a)] : Fintype (Σ'a, β a) := if h : ∃ a, β a then ⟨{⟨h.fst, h.snd⟩}, fun ⟨_, _⟩ => by simp⟩ else ⟨∅, fun ⟨x, y⟩ => (h ⟨x, y⟩).elim⟩ instance pfunFintype (p : Prop) [Decidable p] (α : p → Type) [∀ hp, Fintype (α hp)] : Fintype (∀ hp : p, α hp) := if hp : p then Fintype.ofEquiv (α hp) ⟨fun a _ => a, fun f => f hp, fun _ => rfl, fun _ => rfl⟩ else ⟨singleton fun h => (hp h).elim, fun h => mem_singleton.2 (funext fun x => by contradiction)⟩ section Trunc /-- For `s : Multiset α`, we can lift the existential statement that `∃ x, x ∈ s` to a `Trunc α`. -/ def truncOfMultisetExistsMem {α} (s : Multiset α) : (∃ x, x ∈ s) → Trunc α := Quotient.recOnSubsingleton s fun l h => match l, h with \| [], _ => False.elim (by tauto) \| a :: _, _ => Trunc.mk a /-- A `Nonempty` `Fintype` constructively contains an element. -/ def truncOfNonemptyFintype (α) [Nonempty α] [Fintype α] : Trunc α := truncOfMultisetExistsMem Finset.univ.val (by simp) /-- By iterating over the elements of a fintype, we can lift an existential statement `∃ a, P a` to `Trunc (Σ' a, P a)`, containing data. -/ def truncSigmaOfExists {α} [Fintype α] {P : α → Prop} [DecidablePred P] (h : ∃ a, P a) : Trunc (Σ'a, P a) := @truncOfNonemptyFintype (Σ'a, P a) ((Exists.elim h) fun a ha => ⟨⟨a, ha⟩⟩) _ end Trunc namespace Multiset variable [Fintype α] [Fintype β] @[simp] theorem count_univ [DecidableEq α] (a : α) : count a Finset.univ.val = 1 := count_eq_one_of_mem Finset.univ.nodup (Finset.mem_univ _) @[simp] theorem map_univ_val_equiv (e : α ≃ β) : map e univ.val = univ.val := by rw [← congr_arg Finset.val (Finset.map_univ_equiv e), Finset.map_val, Equiv.coe_toEmbedding] /-- For functions on finite sets, they are bijections iff they map universes into universes. -/ @[simp] theorem bijective_iff_map_univ_eq_univ (f : α → β) : f.Bijective ↔ map f (Finset.univ : Finset α).val = univ.val := ⟨fun bij ↦ congr_arg (·.val) (map_univ_equiv <\| Equiv.ofBijective f bij), fun eq ↦ ⟨ fun a₁ a₂ ↦ inj_on_of_nodup_map (eq.symm ▸ univ.nodup) _ (mem_univ a₁) _ (mem_univ a₂), fun b ↦ have ⟨a, _, h⟩ := mem_map.mp (eq.symm ▸ mem_univ_val b); ⟨a, h⟩⟩⟩ end Multiset /-- Auxiliary definition to show `exists_seq_of_forall_finset_exists`. -/ noncomputable def seqOfForallFinsetExistsAux {α : Type} [DecidableEq α] (P : α → Prop) (r : α → α → Prop) (h : ∀ s : Finset α, ∃ y, (∀ x ∈ s, P x) → P y ∧ ∀ x ∈ s, r x y) : ℕ → α \| n => Classical.choose (h (Finset.image (fun i : Fin n => seqOfForallFinsetExistsAux P r h i) (Finset.univ : Finset (Fin n)))) /-- Induction principle to build a sequence, by adding one point at a time satisfying a given relation with respect to all the previously chosen points. More precisely, Assume that, for any finite set `s`, one can find another point satisfying some relation `r` with respect to all the points in `s`. Then one may construct a function `f : ℕ → α` such that `r (f m) (f n)` holds whenever `m < n`. We also ensure that all constructed points satisfy a given predicate `P`. -/ theorem exists_seq_of_forall_finset_exists {α : Type} (P : α → Prop) (r : α → α → Prop) (h : ∀ s : Finset α, (∀ x ∈ s, P x) → ∃ y, P y ∧ ∀ x ∈ s, r x y) : ∃ f : ℕ → α, (∀ n, P (f n)) ∧ ∀ m n, m < n → r (f m) (f n) := by classical have : Nonempty α := by rcases h ∅ (by simp) with ⟨y, _⟩ exact ⟨y⟩ choose! F hF using h have h' : ∀ s : Finset α, ∃ y, (∀ x ∈ s, P x) → P y ∧ ∀ x ∈ s, r x y := fun s => ⟨F s, hF s⟩ set f := seqOfForallFinsetExistsAux P r h' with hf have A : ∀ n : ℕ, P (f n) := by intro n induction' n using Nat.strong_induction_on with n IH have IH' : ∀ x : Fin n, P (f x) := fun n => IH n.1 n.2 rw [hf, seqOfForallFinsetExistsAux] exact (Classical.choose_spec (h' (Finset.image (fun i : Fin n => f i) (Finset.univ : Finset (Fin n)))) (by simp [IH'])).1 refine ⟨f, A, fun m n hmn => ?_⟩ conv_rhs => rw [hf] rw [seqOfForallFinsetExistsAux] apply (Classical.choose_spec (h' (Finset.image (fun i : Fin n => f i) (Finset.univ : Finset (Fin n)))) (by simp [A])).2 exact Finset.mem_image.2 ⟨⟨m, hmn⟩, Finset.mem_univ _, rfl⟩ /-- Induction principle to build a sequence, by adding one point at a time satisfying a given symmetric relation with respect to all the previously chosen points. More precisely, Assume that, for any finite set `s`, one can find another point satisfying some relation `r` with respect to all the points in `s`. Then one may construct a function `f : ℕ → α` such that `r (f m) (f n)` holds whenever `m ≠ n`. We also ensure that all constructed points satisfy a given predicate `P`. -/ theorem exists_seq_of_forall_finset_exists' {α : Type*} (P : α → Prop) (r : α → α → Prop) [IsSymm α r] (h : ∀ s : Finset α, (∀ x ∈ s, P x) → ∃ y, P y ∧ ∀ x ∈ s, r x y) : ∃ f : ℕ → α, (∀ n, P (f n)) ∧ Pairwise (r on f) := by rcases exists_seq_of_forall_finset_exists P r h with ⟨f, hf, hf'⟩ refine ⟨f, hf, fun m n hmn => ?_⟩ rcases lt_trichotomy m n with (h \| rfl \| h) · exact hf' m n h · exact (hmn rfl).elim · unfold Function.onFun apply symm exact hf' n m h		Mathlib/Data/Fintype/Basic.lean	513	514
/- Copyright (c) 2021 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov, Alex Kontorovich, Heather Macbeth -/ import Mathlib.MeasureTheory.Integral.IntervalIntegral.Periodic deprecated_module (since := "2025-04-13")		Mathlib/MeasureTheory/Integral/Periodic.lean	287	306
/- Copyright (c) 2021 Oliver Nash. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Oliver Nash -/ import Mathlib.Algebra.Lie.Ideal /-! # Ideal operations for Lie algebras Given a Lie module `M` over a Lie algebra `L`, there is a natural action of the Lie ideals of `L` on the Lie submodules of `M`. In the special case that `M = L` with the adjoint action, this provides a pairing of Lie ideals which is especially important. For example, it can be used to define solvability / nilpotency of a Lie algebra via the derived / lower-central series. ## Main definitions * `LieSubmodule.hasBracket` * `LieSubmodule.lieIdeal_oper_eq_linear_span` * `LieIdeal.map_bracket_le` * `LieIdeal.comap_bracket_le` ## Notation Given a Lie module `M` over a Lie algebra `L`, together with a Lie submodule `N ⊆ M` and a Lie ideal `I ⊆ L`, we introduce the notation `⁅I, N⁆` for the Lie submodule of `M` corresponding to the action defined in this file. ## Tags lie algebra, ideal operation -/ universe u v w w₁ w₂ namespace LieSubmodule variable {R : Type u} {L : Type v} {M : Type w} {M₂ : Type w₁} variable [CommRing R] [LieRing L] variable [AddCommGroup M] [Module R M] [LieRingModule L M] variable [AddCommGroup M₂] [Module R M₂] [LieRingModule L M₂] variable (N N' : LieSubmodule R L M) (N₂ : LieSubmodule R L M₂) variable (f : M →ₗ⁅R,L⁆ M₂) section LieIdealOperations theorem map_comap_le : map f (comap f N₂) ≤ N₂ := (N₂ : Set M₂).image_preimage_subset f theorem map_comap_eq (hf : N₂ ≤ f.range) : map f (comap f N₂) = N₂ := by rw [SetLike.ext'_iff] exact Set.image_preimage_eq_of_subset hf theorem le_comap_map : N ≤ comap f (map f N) := (N : Set M).subset_preimage_image f theorem comap_map_eq (hf : f.ker = ⊥) : comap f (map f N) = N := by rw [SetLike.ext'_iff] exact (N : Set M).preimage_image_eq (f.ker_eq_bot.mp hf) @[simp] theorem map_comap_incl : map N.incl (comap N.incl N') = N ⊓ N' := by rw [← toSubmodule_inj] exact (N : Submodule R M).map_comap_subtype N' variable [LieAlgebra R L] [LieModule R L M₂] (I J : LieIdeal R L) /-- Given a Lie module `M` over a Lie algebra `L`, the set of Lie ideals of `L` acts on the set of submodules of `M`. -/ instance hasBracket : Bracket (LieIdeal R L) (LieSubmodule R L M) := ⟨fun I N => lieSpan R L { ⁅(x : L), (n : M)⁆ \| (x : I) (n : N) }⟩ theorem lieIdeal_oper_eq_span : ⁅I, N⁆ = lieSpan R L { ⁅(x : L), (n : M)⁆ \| (x : I) (n : N) } := rfl /-- See also `LieSubmodule.lieIdeal_oper_eq_linear_span'` and `LieSubmodule.lieIdeal_oper_eq_tensor_map_range`. -/ theorem lieIdeal_oper_eq_linear_span [LieModule R L M] : (↑⁅I, N⁆ : Submodule R M) = Submodule.span R { ⁅(x : L), (n : M)⁆ \| (x : I) (n : N) } := by apply le_antisymm · let s := { ⁅(x : L), (n : M)⁆ \| (x : I) (n : N) } have aux : ∀ (y : L), ∀ m' ∈ Submodule.span R s, ⁅y, m'⁆ ∈ Submodule.span R s := by intro y m' hm' refine Submodule.span_induction (R := R) (M := M) (s := s) (p := fun m' _ ↦ ⁅y, m'⁆ ∈ Submodule.span R s) ?_ ?_ ?_ ?_ hm' · rintro m'' ⟨x, n, hm''⟩; rw [← hm'', leibniz_lie] refine Submodule.add_mem _ ?_ ?_ <;> apply Submodule.subset_span · use ⟨⁅y, ↑x⁆, I.lie_mem x.property⟩, n · use x, ⟨⁅y, ↑n⁆, N.lie_mem n.property⟩ · simp only [lie_zero, Submodule.zero_mem] · intro m₁ m₂ _ _ hm₁ hm₂; rw [lie_add]; exact Submodule.add_mem _ hm₁ hm₂ · intro t m'' _ hm''; rw [lie_smul]; exact Submodule.smul_mem _ t hm'' change _ ≤ ({ Submodule.span R s with lie_mem := fun hm' => aux _ _ hm' } : LieSubmodule R L M) rw [lieIdeal_oper_eq_span, lieSpan_le] exact Submodule.subset_span · rw [lieIdeal_oper_eq_span]; apply submodule_span_le_lieSpan theorem lieIdeal_oper_eq_linear_span' [LieModule R L M] : (↑⁅I, N⁆ : Submodule R M) = Submodule.span R { ⁅x, n⁆ \| (x ∈ I) (n ∈ N) } := by rw [lieIdeal_oper_eq_linear_span] congr ext m constructor · rintro ⟨⟨x, hx⟩, ⟨n, hn⟩, rfl⟩ exact ⟨x, hx, n, hn, rfl⟩ · rintro ⟨x, hx, n, hn, rfl⟩ exact ⟨⟨x, hx⟩, ⟨n, hn⟩, rfl⟩ theorem lie_le_iff : ⁅I, N⁆ ≤ N' ↔ ∀ x ∈ I, ∀ m ∈ N, ⁅x, m⁆ ∈ N' := by rw [lieIdeal_oper_eq_span, LieSubmodule.lieSpan_le] refine ⟨fun h x hx m hm => h ⟨⟨x, hx⟩, ⟨m, hm⟩, rfl⟩, ?_⟩ rintro h _ ⟨⟨x, hx⟩, ⟨m, hm⟩, rfl⟩ exact h x hx m hm variable {N I} in theorem lie_coe_mem_lie (x : I) (m : N) : ⁅(x : L), (m : M)⁆ ∈ ⁅I, N⁆ := by rw [lieIdeal_oper_eq_span]; apply subset_lieSpan; use x, m variable {N I} in theorem lie_mem_lie {x : L} {m : M} (hx : x ∈ I) (hm : m ∈ N) : ⁅x, m⁆ ∈ ⁅I, N⁆ := lie_coe_mem_lie ⟨x, hx⟩ ⟨m, hm⟩ theorem lie_comm : ⁅I, J⁆ = ⁅J, I⁆ := by suffices ∀ I J : LieIdeal R L, ⁅I, J⁆ ≤ ⁅J, I⁆ by exact le_antisymm (this I J) (this J I) clear! I J; intro I J rw [lieIdeal_oper_eq_span, lieSpan_le]; rintro x ⟨y, z, h⟩; rw [← h] rw [← lie_skew, ← lie_neg, ← LieSubmodule.coe_neg] apply lie_coe_mem_lie theorem lie_le_right : ⁅I, N⁆ ≤ N := by rw [lieIdeal_oper_eq_span, lieSpan_le]; rintro m ⟨x, n, hn⟩; rw [← hn] exact N.lie_mem n.property theorem lie_le_left : ⁅I, J⁆ ≤ I := by rw [lie_comm]; exact lie_le_right I J theorem lie_le_inf : ⁅I, J⁆ ≤ I ⊓ J := by rw [le_inf_iff]; exact ⟨lie_le_left I J, lie_le_right J I⟩ @[simp] theorem lie_bot : ⁅I, (⊥ : LieSubmodule R L M)⁆ = ⊥ := by rw [eq_bot_iff]; apply lie_le_right @[simp] theorem bot_lie : ⁅(⊥ : LieIdeal R L), N⁆ = ⊥ := by suffices ⁅(⊥ : LieIdeal R L), N⁆ ≤ ⊥ by exact le_bot_iff.mp this rw [lieIdeal_oper_eq_span, lieSpan_le]; rintro m ⟨⟨x, hx⟩, n, hn⟩; rw [← hn] change x ∈ (⊥ : LieIdeal R L) at hx; rw [mem_bot] at hx; simp [hx] theorem lie_eq_bot_iff : ⁅I, N⁆ = ⊥ ↔ ∀ x ∈ I, ∀ m ∈ N, ⁅(x : L), m⁆ = 0 := by rw [lieIdeal_oper_eq_span, LieSubmodule.lieSpan_eq_bot_iff] refine ⟨fun h x hx m hm => h ⁅x, m⁆ ⟨⟨x, hx⟩, ⟨m, hm⟩, rfl⟩, ?_⟩ rintro h - ⟨⟨x, hx⟩, ⟨⟨n, hn⟩, rfl⟩⟩ exact h x hx n hn variable {I J N N'} in theorem mono_lie (h₁ : I ≤ J) (h₂ : N ≤ N') : ⁅I, N⁆ ≤ ⁅J, N'⁆ := by intro m h rw [lieIdeal_oper_eq_span, mem_lieSpan] at h; rw [lieIdeal_oper_eq_span, mem_lieSpan] intro N hN; apply h; rintro m' ⟨⟨x, hx⟩, ⟨n, hn⟩, hm⟩; rw [← hm]; apply hN use ⟨x, h₁ hx⟩, ⟨n, h₂ hn⟩ variable {I J} in theorem mono_lie_left (h : I ≤ J) : ⁅I, N⁆ ≤ ⁅J, N⁆ :=	mono_lie h (le_refl N) variable {N N'} in theorem mono_lie_right (h : N ≤ N') : ⁅I, N⁆ ≤ ⁅I, N'⁆ := mono_lie (le_refl I) h @[simp] theorem lie_sup : ⁅I, N ⊔ N'⁆ = ⁅I, N⁆ ⊔ ⁅I, N'⁆ := by have h : ⁅I, N⁆ ⊔ ⁅I, N'⁆ ≤ ⁅I, N ⊔ N'⁆ := by rw [sup_le_iff]; constructor <;>	Mathlib/Algebra/Lie/IdealOperations.lean	164	173
/- 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.Topology.UniformSpace.Cauchy /-! # Uniform convergence A sequence of functions `Fₙ` (with values in a metric space) converges uniformly on a set `s` to a function `f` if, for all `ε > 0`, for all large enough `n`, one has for all `y ∈ s` the inequality `dist (f y, Fₙ y) < ε`. Under uniform convergence, many properties of the `Fₙ` pass to the limit, most notably continuity. We prove this in the file, defining the notion of uniform convergence in the more general setting of uniform spaces, and with respect to an arbitrary indexing set endowed with a filter (instead of just `ℕ` with `atTop`). ## Main results Let `α` be a topological space, `β` a uniform space, `Fₙ` and `f` be functions from `α` to `β` (where the index `n` belongs to an indexing type `ι` endowed with a filter `p`). * `TendstoUniformlyOn F f p s`: the fact that `Fₙ` converges uniformly to `f` on `s`. This means that, for any entourage `u` of the diagonal, for large enough `n` (with respect to `p`), one has `(f y, Fₙ y) ∈ u` for all `y ∈ s`. * `TendstoUniformly F f p`: same notion with `s = univ`. * `TendstoUniformlyOn.continuousOn`: a uniform limit on a set of functions which are continuous on this set is itself continuous on this set. * `TendstoUniformly.continuous`: a uniform limit of continuous functions is continuous. * `TendstoUniformlyOn.tendsto_comp`: If `Fₙ` tends uniformly to `f` on a set `s`, and `gₙ` tends to `x` within `s`, then `Fₙ gₙ` tends to `f x` if `f` is continuous at `x` within `s`. * `TendstoUniformly.tendsto_comp`: If `Fₙ` tends uniformly to `f`, and `gₙ` tends to `x`, then `Fₙ gₙ` tends to `f x`. Finally, we introduce the notion of a uniform Cauchy sequence, which is to uniform convergence what a Cauchy sequence is to the usual notion of convergence. ## Implementation notes We derive most of our initial results from an auxiliary definition `TendstoUniformlyOnFilter`. This definition in and of itself can sometimes be useful, e.g., when studying the local behavior of the `Fₙ` near a point, which would typically look like `TendstoUniformlyOnFilter F f p (𝓝 x)`. Still, while this may be the "correct" definition (see `tendstoUniformlyOn_iff_tendstoUniformlyOnFilter`), it is somewhat unwieldy to work with in practice. Thus, we provide the more traditional definition in `TendstoUniformlyOn`. ## Tags Uniform limit, uniform convergence, tends uniformly to -/ noncomputable section open Topology Uniformity Filter Set Uniform variable {α β γ ι : Type} [UniformSpace β] variable {F : ι → α → β} {f : α → β} {s s' : Set α} {x : α} {p : Filter ι} {p' : Filter α} /-! ### Different notions of uniform convergence We define uniform convergence, on a set or in the whole space. -/ /-- A sequence of functions `Fₙ` converges uniformly on a filter `p'` to a limiting function `f` with respect to the filter `p` if, for any entourage of the diagonal `u`, one has `p ×ˢ p'`-eventually `(f x, Fₙ x) ∈ u`. -/ def TendstoUniformlyOnFilter (F : ι → α → β) (f : α → β) (p : Filter ι) (p' : Filter α) := ∀ u ∈ 𝓤 β, ∀ᶠ n : ι × α in p ×ˢ p', (f n.snd, F n.fst n.snd) ∈ u /-- A sequence of functions `Fₙ` converges uniformly on a filter `p'` to a limiting function `f` w.r.t. filter `p` iff the function `(n, x) ↦ (f x, Fₙ x)` converges along `p ×ˢ p'` to the uniformity. In other words: one knows nothing about the behavior of `x` in this limit besides it being in `p'`. -/ theorem tendstoUniformlyOnFilter_iff_tendsto : TendstoUniformlyOnFilter F f p p' ↔ Tendsto (fun q : ι × α => (f q.2, F q.1 q.2)) (p ×ˢ p') (𝓤 β) := Iff.rfl /-- A sequence of functions `Fₙ` converges uniformly on a set `s` to a limiting function `f` with respect to the filter `p` if, for any entourage of the diagonal `u`, one has `p`-eventually `(f x, Fₙ x) ∈ u` for all `x ∈ s`. -/ def TendstoUniformlyOn (F : ι → α → β) (f : α → β) (p : Filter ι) (s : Set α) := ∀ u ∈ 𝓤 β, ∀ᶠ n in p, ∀ x : α, x ∈ s → (f x, F n x) ∈ u theorem tendstoUniformlyOn_iff_tendstoUniformlyOnFilter : TendstoUniformlyOn F f p s ↔ TendstoUniformlyOnFilter F f p (𝓟 s) := by simp only [TendstoUniformlyOn, TendstoUniformlyOnFilter] apply forall₂_congr simp_rw [eventually_prod_principal_iff] simp alias ⟨TendstoUniformlyOn.tendstoUniformlyOnFilter, TendstoUniformlyOnFilter.tendstoUniformlyOn⟩ := tendstoUniformlyOn_iff_tendstoUniformlyOnFilter /-- A sequence of functions `Fₙ` converges uniformly on a set `s` to a limiting function `f` w.r.t. filter `p` iff the function `(n, x) ↦ (f x, Fₙ x)` converges along `p ×ˢ 𝓟 s` to the uniformity. In other words: one knows nothing about the behavior of `x` in this limit besides it being in `s`. -/ theorem tendstoUniformlyOn_iff_tendsto : TendstoUniformlyOn F f p s ↔ Tendsto (fun q : ι × α => (f q.2, F q.1 q.2)) (p ×ˢ 𝓟 s) (𝓤 β) := by simp [tendstoUniformlyOn_iff_tendstoUniformlyOnFilter, tendstoUniformlyOnFilter_iff_tendsto] /-- A sequence of functions `Fₙ` converges uniformly to a limiting function `f` with respect to a filter `p` if, for any entourage of the diagonal `u`, one has `p`-eventually `(f x, Fₙ x) ∈ u` for all `x`. -/ def TendstoUniformly (F : ι → α → β) (f : α → β) (p : Filter ι) := ∀ u ∈ 𝓤 β, ∀ᶠ n in p, ∀ x : α, (f x, F n x) ∈ u theorem tendstoUniformlyOn_univ : TendstoUniformlyOn F f p univ ↔ TendstoUniformly F f p := by simp [TendstoUniformlyOn, TendstoUniformly] theorem tendstoUniformly_iff_tendstoUniformlyOnFilter : TendstoUniformly F f p ↔ TendstoUniformlyOnFilter F f p ⊤ := by rw [← tendstoUniformlyOn_univ, tendstoUniformlyOn_iff_tendstoUniformlyOnFilter, principal_univ] theorem TendstoUniformly.tendstoUniformlyOnFilter (h : TendstoUniformly F f p) : TendstoUniformlyOnFilter F f p ⊤ := by rwa [← tendstoUniformly_iff_tendstoUniformlyOnFilter] theorem tendstoUniformlyOn_iff_tendstoUniformly_comp_coe : TendstoUniformlyOn F f p s ↔ TendstoUniformly (fun i (x : s) => F i x) (f ∘ (↑)) p := forall₂_congr fun u _ => by simp /-- A sequence of functions `Fₙ` converges uniformly to a limiting function `f` w.r.t. filter `p` iff the function `(n, x) ↦ (f x, Fₙ x)` converges along `p ×ˢ ⊤` to the uniformity. In other words: one knows nothing about the behavior of `x` in this limit. -/ theorem tendstoUniformly_iff_tendsto : TendstoUniformly F f p ↔ Tendsto (fun q : ι × α => (f q.2, F q.1 q.2)) (p ×ˢ ⊤) (𝓤 β) := by simp [tendstoUniformly_iff_tendstoUniformlyOnFilter, tendstoUniformlyOnFilter_iff_tendsto] /-- Uniform convergence implies pointwise convergence. -/ theorem TendstoUniformlyOnFilter.tendsto_at (h : TendstoUniformlyOnFilter F f p p') (hx : 𝓟 {x} ≤ p') : Tendsto (fun n => F n x) p <\| 𝓝 (f x) := by refine Uniform.tendsto_nhds_right.mpr fun u hu => mem_map.mpr ?_ filter_upwards [(h u hu).curry] intro i h simpa using h.filter_mono hx /-- Uniform convergence implies pointwise convergence. -/ theorem TendstoUniformlyOn.tendsto_at (h : TendstoUniformlyOn F f p s) (hx : x ∈ s) : Tendsto (fun n => F n x) p <\| 𝓝 (f x) := h.tendstoUniformlyOnFilter.tendsto_at (le_principal_iff.mpr <\| mem_principal.mpr <\| singleton_subset_iff.mpr <\| hx) /-- Uniform convergence implies pointwise convergence. -/ theorem TendstoUniformly.tendsto_at (h : TendstoUniformly F f p) (x : α) : Tendsto (fun n => F n x) p <\| 𝓝 (f x) := h.tendstoUniformlyOnFilter.tendsto_at le_top theorem TendstoUniformlyOnFilter.mono_left {p'' : Filter ι} (h : TendstoUniformlyOnFilter F f p p') (hp : p'' ≤ p) : TendstoUniformlyOnFilter F f p'' p' := fun u hu => (h u hu).filter_mono (p'.prod_mono_left hp) theorem TendstoUniformlyOnFilter.mono_right {p'' : Filter α} (h : TendstoUniformlyOnFilter F f p p') (hp : p'' ≤ p') : TendstoUniformlyOnFilter F f p p'' := fun u hu => (h u hu).filter_mono (p.prod_mono_right hp) theorem TendstoUniformlyOn.mono (h : TendstoUniformlyOn F f p s) (h' : s' ⊆ s) : TendstoUniformlyOn F f p s' := tendstoUniformlyOn_iff_tendstoUniformlyOnFilter.mpr (h.tendstoUniformlyOnFilter.mono_right (le_principal_iff.mpr <\| mem_principal.mpr h')) theorem TendstoUniformlyOnFilter.congr {F' : ι → α → β} (hf : TendstoUniformlyOnFilter F f p p') (hff' : ∀ᶠ n : ι × α in p ×ˢ p', F n.fst n.snd = F' n.fst n.snd) : TendstoUniformlyOnFilter F' f p p' := by refine fun u hu => ((hf u hu).and hff').mono fun n h => ?_ rw [← h.right] exact h.left theorem TendstoUniformlyOn.congr {F' : ι → α → β} (hf : TendstoUniformlyOn F f p s) (hff' : ∀ᶠ n in p, Set.EqOn (F n) (F' n) s) : TendstoUniformlyOn F' f p s := by rw [tendstoUniformlyOn_iff_tendstoUniformlyOnFilter] at hf ⊢ refine hf.congr ?_ rw [eventually_iff] at hff' ⊢ simp only [Set.EqOn] at hff' simp only [mem_prod_principal, hff', mem_setOf_eq] lemma tendstoUniformly_congr {F' : ι → α → β} (hF : F =ᶠ[p] F') : TendstoUniformly F f p ↔ TendstoUniformly F' f p := by simp_rw [← tendstoUniformlyOn_univ] at have HF := EventuallyEq.exists_mem hF exact ⟨fun h => h.congr (by aesop), fun h => h.congr (by simp_rw [eqOn_comm]; aesop)⟩ theorem TendstoUniformlyOn.congr_right {g : α → β} (hf : TendstoUniformlyOn F f p s) (hfg : EqOn f g s) : TendstoUniformlyOn F g p s := fun u hu => by filter_upwards [hf u hu] with i hi a ha using hfg ha ▸ hi a ha protected theorem TendstoUniformly.tendstoUniformlyOn (h : TendstoUniformly F f p) : TendstoUniformlyOn F f p s := (tendstoUniformlyOn_univ.2 h).mono (subset_univ s) /-- Composing on the right by a function preserves uniform convergence on a filter -/ theorem TendstoUniformlyOnFilter.comp (h : TendstoUniformlyOnFilter F f p p') (g : γ → α) : TendstoUniformlyOnFilter (fun n => F n ∘ g) (f ∘ g) p (p'.comap g) := by rw [tendstoUniformlyOnFilter_iff_tendsto] at h ⊢ exact h.comp (tendsto_id.prodMap tendsto_comap) /-- Composing on the right by a function preserves uniform convergence on a set -/ theorem TendstoUniformlyOn.comp (h : TendstoUniformlyOn F f p s) (g : γ → α) : TendstoUniformlyOn (fun n => F n ∘ g) (f ∘ g) p (g ⁻¹' s) := by rw [tendstoUniformlyOn_iff_tendstoUniformlyOnFilter] at h ⊢ simpa [TendstoUniformlyOn, comap_principal] using TendstoUniformlyOnFilter.comp h g /-- Composing on the right by a function preserves uniform convergence -/ theorem TendstoUniformly.comp (h : TendstoUniformly F f p) (g : γ → α) : TendstoUniformly (fun n => F n ∘ g) (f ∘ g) p := by rw [tendstoUniformly_iff_tendstoUniformlyOnFilter] at h ⊢ simpa [principal_univ, comap_principal] using h.comp g /-- Composing on the left by a uniformly continuous function preserves uniform convergence on a filter -/ theorem UniformContinuous.comp_tendstoUniformlyOnFilter [UniformSpace γ] {g : β → γ} (hg : UniformContinuous g) (h : TendstoUniformlyOnFilter F f p p') : TendstoUniformlyOnFilter (fun i => g ∘ F i) (g ∘ f) p p' := fun _u hu => h _ (hg hu) /-- Composing on the left by a uniformly continuous function preserves uniform convergence on a set -/ theorem UniformContinuous.comp_tendstoUniformlyOn [UniformSpace γ] {g : β → γ} (hg : UniformContinuous g) (h : TendstoUniformlyOn F f p s) : TendstoUniformlyOn (fun i => g ∘ F i) (g ∘ f) p s := fun _u hu => h _ (hg hu) /-- Composing on the left by a uniformly continuous function preserves uniform convergence -/ theorem UniformContinuous.comp_tendstoUniformly [UniformSpace γ] {g : β → γ} (hg : UniformContinuous g) (h : TendstoUniformly F f p) : TendstoUniformly (fun i => g ∘ F i) (g ∘ f) p := fun _u hu => h _ (hg hu) theorem TendstoUniformlyOnFilter.prodMap {ι' α' β' : Type} [UniformSpace β'] {F' : ι' → α' → β'} {f' : α' → β'} {q : Filter ι'} {q' : Filter α'} (h : TendstoUniformlyOnFilter F f p p') (h' : TendstoUniformlyOnFilter F' f' q q') : TendstoUniformlyOnFilter (fun i : ι × ι' => Prod.map (F i.1) (F' i.2)) (Prod.map f f') (p ×ˢ q) (p' ×ˢ q') := by rw [tendstoUniformlyOnFilter_iff_tendsto] at h h' ⊢ rw [uniformity_prod_eq_comap_prod, tendsto_comap_iff, ← map_swap4_prod, tendsto_map'_iff] simpa using h.prodMap h' @[deprecated (since := "2025-03-10")] alias TendstoUniformlyOnFilter.prod_map := TendstoUniformlyOnFilter.prodMap theorem TendstoUniformlyOn.prodMap {ι' α' β' : Type} [UniformSpace β'] {F' : ι' → α' → β'} {f' : α' → β'} {p' : Filter ι'} {s' : Set α'} (h : TendstoUniformlyOn F f p s) (h' : TendstoUniformlyOn F' f' p' s') : TendstoUniformlyOn (fun i : ι × ι' => Prod.map (F i.1) (F' i.2)) (Prod.map f f') (p ×ˢ p') (s ×ˢ s') := by rw [tendstoUniformlyOn_iff_tendstoUniformlyOnFilter] at h h' ⊢ simpa only [prod_principal_principal] using h.prodMap h' @[deprecated (since := "2025-03-10")] alias TendstoUniformlyOn.prod_map := TendstoUniformlyOn.prodMap theorem TendstoUniformly.prodMap {ι' α' β' : Type} [UniformSpace β'] {F' : ι' → α' → β'} {f' : α' → β'} {p' : Filter ι'} (h : TendstoUniformly F f p) (h' : TendstoUniformly F' f' p') : TendstoUniformly (fun i : ι × ι' => Prod.map (F i.1) (F' i.2)) (Prod.map f f') (p ×ˢ p') := by rw [← tendstoUniformlyOn_univ, ← univ_prod_univ] at exact h.prodMap h' @[deprecated (since := "2025-03-10")] alias TendstoUniformly.prod_map := TendstoUniformly.prodMap theorem TendstoUniformlyOnFilter.prodMk {ι' β' : Type} [UniformSpace β'] {F' : ι' → α → β'} {f' : α → β'} {q : Filter ι'} (h : TendstoUniformlyOnFilter F f p p') (h' : TendstoUniformlyOnFilter F' f' q p') : TendstoUniformlyOnFilter (fun (i : ι × ι') a => (F i.1 a, F' i.2 a)) (fun a => (f a, f' a)) (p ×ˢ q) p' := fun u hu => ((h.prodMap h') u hu).diag_of_prod_right @[deprecated (since := "2025-03-10")] alias TendstoUniformlyOnFilter.prod := TendstoUniformlyOnFilter.prodMk protected theorem TendstoUniformlyOn.prodMk {ι' β' : Type} [UniformSpace β'] {F' : ι' → α → β'} {f' : α → β'} {p' : Filter ι'} (h : TendstoUniformlyOn F f p s) (h' : TendstoUniformlyOn F' f' p' s) : TendstoUniformlyOn (fun (i : ι × ι') a => (F i.1 a, F' i.2 a)) (fun a => (f a, f' a)) (p ×ˢ p') s := (congr_arg _ s.inter_self).mp ((h.prodMap h').comp fun a => (a, a)) @[deprecated (since := "2025-03-10")] alias TendstoUniformlyOn.prod := TendstoUniformlyOn.prodMk theorem TendstoUniformly.prodMk {ι' β' : Type} [UniformSpace β'] {F' : ι' → α → β'} {f' : α → β'} {p' : Filter ι'} (h : TendstoUniformly F f p) (h' : TendstoUniformly F' f' p') : TendstoUniformly (fun (i : ι × ι') a => (F i.1 a, F' i.2 a)) (fun a => (f a, f' a)) (p ×ˢ p') := (h.prodMap h').comp fun a => (a, a) @[deprecated (since := "2025-03-10")] alias TendstoUniformly.prod := TendstoUniformly.prodMk /-- Uniform convergence on a filter `p'` to a constant function is equivalent to convergence in `p ×ˢ p'`. -/ theorem tendsto_prod_filter_iff {c : β} : Tendsto (↿F) (p ×ˢ p') (𝓝 c) ↔ TendstoUniformlyOnFilter F (fun _ => c) p p' := by simp_rw [nhds_eq_comap_uniformity, tendsto_comap_iff] rfl /-- Uniform convergence on a set `s` to a constant function is equivalent to convergence in `p ×ˢ 𝓟 s`. -/ theorem tendsto_prod_principal_iff {c : β} : Tendsto (↿F) (p ×ˢ 𝓟 s) (𝓝 c) ↔ TendstoUniformlyOn F (fun _ => c) p s := by rw [tendstoUniformlyOn_iff_tendstoUniformlyOnFilter] exact tendsto_prod_filter_iff /-- Uniform convergence to a constant function is equivalent to convergence in `p ×ˢ ⊤`. -/ theorem tendsto_prod_top_iff {c : β} : Tendsto (↿F) (p ×ˢ ⊤) (𝓝 c) ↔ TendstoUniformly F (fun _ => c) p := by rw [tendstoUniformly_iff_tendstoUniformlyOnFilter] exact tendsto_prod_filter_iff /-- Uniform convergence on the empty set is vacuously true -/ theorem tendstoUniformlyOn_empty : TendstoUniformlyOn F f p ∅ := fun u _ => by simp /-- Uniform convergence on a singleton is equivalent to regular convergence -/ theorem tendstoUniformlyOn_singleton_iff_tendsto : TendstoUniformlyOn F f p {x} ↔ Tendsto (fun n : ι => F n x) p (𝓝 (f x)) := by simp_rw [tendstoUniformlyOn_iff_tendsto, Uniform.tendsto_nhds_right, tendsto_def] exact forall₂_congr fun u _ => by simp [mem_prod_principal, preimage] /-- If a sequence `g` converges to some `b`, then the sequence of constant functions `fun n ↦ fun a ↦ g n` converges to the constant function `fun a ↦ b` on any set `s` -/ theorem Filter.Tendsto.tendstoUniformlyOnFilter_const {g : ι → β} {b : β} (hg : Tendsto g p (𝓝 b)) (p' : Filter α) : TendstoUniformlyOnFilter (fun n : ι => fun _ : α => g n) (fun _ : α => b) p p' := by simpa only [nhds_eq_comap_uniformity, tendsto_comap_iff] using hg.comp (tendsto_fst (g := p')) /-- If a sequence `g` converges to some `b`, then the sequence of constant functions `fun n ↦ fun a ↦ g n` converges to the constant function `fun a ↦ b` on any set `s` -/ theorem Filter.Tendsto.tendstoUniformlyOn_const {g : ι → β} {b : β} (hg : Tendsto g p (𝓝 b)) (s : Set α) : TendstoUniformlyOn (fun n : ι => fun _ : α => g n) (fun _ : α => b) p s := tendstoUniformlyOn_iff_tendstoUniformlyOnFilter.mpr (hg.tendstoUniformlyOnFilter_const (𝓟 s)) theorem UniformContinuousOn.tendstoUniformlyOn [UniformSpace α] [UniformSpace γ] {U : Set α} {V : Set β} {F : α → β → γ} (hF : UniformContinuousOn (↿F) (U ×ˢ V)) (hU : x ∈ U) : TendstoUniformlyOn F (F x) (𝓝[U] x) V := by set φ := fun q : α × β => ((x, q.2), q) rw [tendstoUniformlyOn_iff_tendsto] change Tendsto (Prod.map (↿F) ↿F ∘ φ) (𝓝[U] x ×ˢ 𝓟 V) (𝓤 γ) simp only [nhdsWithin, Filter.prod_eq_inf, comap_inf, inf_assoc, comap_principal, inf_principal] refine hF.comp (Tendsto.inf ?_ <\| tendsto_principal_principal.2 fun x hx => ⟨⟨hU, hx.2⟩, hx⟩) simp only [uniformity_prod_eq_comap_prod, tendsto_comap_iff, (· ∘ ·), nhds_eq_comap_uniformity, comap_comap] exact tendsto_comap.prodMk (tendsto_diag_uniformity _ _) theorem UniformContinuousOn.tendstoUniformly [UniformSpace α] [UniformSpace γ] {U : Set α} (hU : U ∈ 𝓝 x) {F : α → β → γ} (hF : UniformContinuousOn (↿F) (U ×ˢ (univ : Set β))) : TendstoUniformly F (F x) (𝓝 x) := by simpa only [tendstoUniformlyOn_univ, nhdsWithin_eq_nhds.2 hU] using hF.tendstoUniformlyOn (mem_of_mem_nhds hU) theorem UniformContinuous₂.tendstoUniformly [UniformSpace α] [UniformSpace γ] {f : α → β → γ} (h : UniformContinuous₂ f) : TendstoUniformly f (f x) (𝓝 x) := UniformContinuousOn.tendstoUniformly univ_mem <\| by rwa [univ_prod_univ, uniformContinuousOn_univ] /-- A sequence is uniformly Cauchy if eventually all of its pairwise differences are uniformly bounded -/ def UniformCauchySeqOnFilter (F : ι → α → β) (p : Filter ι) (p' : Filter α) : Prop := ∀ u ∈ 𝓤 β, ∀ᶠ m : (ι × ι) × α in (p ×ˢ p) ×ˢ p', (F m.fst.fst m.snd, F m.fst.snd m.snd) ∈ u /-- A sequence is uniformly Cauchy if eventually all of its pairwise differences are uniformly bounded -/ def UniformCauchySeqOn (F : ι → α → β) (p : Filter ι) (s : Set α) : Prop := ∀ u ∈ 𝓤 β, ∀ᶠ m : ι × ι in p ×ˢ p, ∀ x : α, x ∈ s → (F m.fst x, F m.snd x) ∈ u theorem uniformCauchySeqOn_iff_uniformCauchySeqOnFilter : UniformCauchySeqOn F p s ↔ UniformCauchySeqOnFilter F p (𝓟 s) := by simp only [UniformCauchySeqOn, UniformCauchySeqOnFilter] refine forall₂_congr fun u hu => ?_ rw [eventually_prod_principal_iff] theorem UniformCauchySeqOn.uniformCauchySeqOnFilter (hF : UniformCauchySeqOn F p s) : UniformCauchySeqOnFilter F p (𝓟 s) := by rwa [← uniformCauchySeqOn_iff_uniformCauchySeqOnFilter] /-- A sequence that converges uniformly is also uniformly Cauchy -/ theorem TendstoUniformlyOnFilter.uniformCauchySeqOnFilter (hF : TendstoUniformlyOnFilter F f p p') : UniformCauchySeqOnFilter F p p' := by intro u hu rcases comp_symm_of_uniformity hu with ⟨t, ht, htsymm, htmem⟩ have := tendsto_swap4_prod.eventually ((hF t ht).prod_mk (hF t ht)) apply this.diag_of_prod_right.mono simp only [and_imp, Prod.forall] intro n1 n2 x hl hr exact Set.mem_of_mem_of_subset (prodMk_mem_compRel (htsymm hl) hr) htmem /-- A sequence that converges uniformly is also uniformly Cauchy -/ theorem TendstoUniformlyOn.uniformCauchySeqOn (hF : TendstoUniformlyOn F f p s) : UniformCauchySeqOn F p s := uniformCauchySeqOn_iff_uniformCauchySeqOnFilter.mpr hF.tendstoUniformlyOnFilter.uniformCauchySeqOnFilter /-- A uniformly Cauchy sequence converges uniformly to its limit -/ theorem UniformCauchySeqOnFilter.tendstoUniformlyOnFilter_of_tendsto (hF : UniformCauchySeqOnFilter F p p') (hF' : ∀ᶠ x : α in p', Tendsto (fun n => F n x) p (𝓝 (f x))) : TendstoUniformlyOnFilter F f p p' := by rcases p.eq_or_neBot with rfl \| _ · simp only [TendstoUniformlyOnFilter, bot_prod, eventually_bot, implies_true] -- Proof idea: \|f_n(x) - f(x)\| ≤ \|f_n(x) - f_m(x)\| + \|f_m(x) - f(x)\|. We choose `n` -- so that \|f_n(x) - f_m(x)\| is uniformly small across `s` whenever `m ≥ n`. Then for -- a fixed `x`, we choose `m` sufficiently large such that \|f_m(x) - f(x)\| is small. intro u hu rcases comp_symm_of_uniformity hu with ⟨t, ht, htsymm, htmem⟩ -- We will choose n, x, and m simultaneously. n and x come from hF. m comes from hF' -- But we need to promote hF' to the full product filter to use it have hmc : ∀ᶠ x in (p ×ˢ p) ×ˢ p', Tendsto (fun n : ι => F n x.snd) p (𝓝 (f x.snd)) := by rw [eventually_prod_iff] exact ⟨fun _ => True, by simp, _, hF', by simp⟩ -- To apply filter operations we'll need to do some order manipulation rw [Filter.eventually_swap_iff] have := tendsto_prodAssoc.eventually (tendsto_prod_swap.eventually ((hF t ht).and hmc)) apply this.curry.mono simp only [Equiv.prodAssoc_apply, eventually_and, eventually_const, Prod.snd_swap, Prod.fst_swap, and_imp, Prod.forall] -- Complete the proof intro x n hx hm' refine Set.mem_of_mem_of_subset (mem_compRel.mpr ?_) htmem rw [Uniform.tendsto_nhds_right] at hm' have := hx.and (hm' ht) obtain ⟨m, hm⟩ := this.exists exact ⟨F m x, ⟨hm.2, htsymm hm.1⟩⟩ /-- A uniformly Cauchy sequence converges uniformly to its limit -/ theorem UniformCauchySeqOn.tendstoUniformlyOn_of_tendsto (hF : UniformCauchySeqOn F p s) (hF' : ∀ x : α, x ∈ s → Tendsto (fun n => F n x) p (𝓝 (f x))) : TendstoUniformlyOn F f p s := tendstoUniformlyOn_iff_tendstoUniformlyOnFilter.mpr (hF.uniformCauchySeqOnFilter.tendstoUniformlyOnFilter_of_tendsto hF') theorem UniformCauchySeqOnFilter.mono_left {p'' : Filter ι} (hf : UniformCauchySeqOnFilter F p p') (hp : p'' ≤ p) : UniformCauchySeqOnFilter F p'' p' := by intro u hu have := (hf u hu).filter_mono (p'.prod_mono_left (Filter.prod_mono hp hp)) exact this.mono (by simp) theorem UniformCauchySeqOnFilter.mono_right {p'' : Filter α} (hf : UniformCauchySeqOnFilter F p p') (hp : p'' ≤ p') : UniformCauchySeqOnFilter F p p'' := fun u hu => have := (hf u hu).filter_mono ((p ×ˢ p).prod_mono_right hp) this.mono (by simp) theorem UniformCauchySeqOn.mono (hf : UniformCauchySeqOn F p s) (hss' : s' ⊆ s) : UniformCauchySeqOn F p s' := by rw [uniformCauchySeqOn_iff_uniformCauchySeqOnFilter] at hf ⊢ exact hf.mono_right (le_principal_iff.mpr <\| mem_principal.mpr hss') /-- Composing on the right by a function preserves uniform Cauchy sequences -/ theorem UniformCauchySeqOnFilter.comp {γ : Type} (hf : UniformCauchySeqOnFilter F p p') (g : γ → α) : UniformCauchySeqOnFilter (fun n => F n ∘ g) p (p'.comap g) := fun u hu => by obtain ⟨pa, hpa, pb, hpb, hpapb⟩ := eventually_prod_iff.mp (hf u hu) rw [eventually_prod_iff] refine ⟨pa, hpa, pb ∘ g, ?_, fun hx _ hy => hpapb hx hy⟩ exact eventually_comap.mpr (hpb.mono fun x hx y hy => by simp only [hx, hy, Function.comp_apply]) /-- Composing on the right by a function preserves uniform Cauchy sequences -/ theorem UniformCauchySeqOn.comp {γ : Type} (hf : UniformCauchySeqOn F p s) (g : γ → α) : UniformCauchySeqOn (fun n => F n ∘ g) p (g ⁻¹' s) := by rw [uniformCauchySeqOn_iff_uniformCauchySeqOnFilter] at hf ⊢ simpa only [UniformCauchySeqOn, comap_principal] using hf.comp g /-- Composing on the left by a uniformly continuous function preserves uniform Cauchy sequences -/ theorem UniformContinuous.comp_uniformCauchySeqOn [UniformSpace γ] {g : β → γ} (hg : UniformContinuous g) (hf : UniformCauchySeqOn F p s) : UniformCauchySeqOn (fun n => g ∘ F n) p s := fun _u hu => hf _ (hg hu) theorem UniformCauchySeqOn.prodMap {ι' α' β' : Type} [UniformSpace β'] {F' : ι' → α' → β'} {p' : Filter ι'} {s' : Set α'} (h : UniformCauchySeqOn F p s) (h' : UniformCauchySeqOn F' p' s') : UniformCauchySeqOn (fun i : ι × ι' => Prod.map (F i.1) (F' i.2)) (p ×ˢ p') (s ×ˢ s') := by intro u hu rw [uniformity_prod_eq_prod, mem_map, mem_prod_iff] at hu obtain ⟨v, hv, w, hw, hvw⟩ := hu simp_rw [mem_prod, and_imp, Prod.forall, Prod.map_apply] rw [← Set.image_subset_iff] at hvw apply (tendsto_swap4_prod.eventually ((h v hv).prod_mk (h' w hw))).mono intro x hx a b ha hb exact hvw ⟨_, mk_mem_prod (hx.1 a ha) (hx.2 b hb), rfl⟩ @[deprecated (since := "2025-03-10")] alias UniformCauchySeqOn.prod_map := UniformCauchySeqOn.prodMap theorem UniformCauchySeqOn.prod {ι' β' : Type} [UniformSpace β'] {F' : ι' → α → β'} {p' : Filter ι'} (h : UniformCauchySeqOn F p s) (h' : UniformCauchySeqOn F' p' s) : UniformCauchySeqOn (fun (i : ι × ι') a => (F i.fst a, F' i.snd a)) (p ×ˢ p') s := (congr_arg _ s.inter_self).mp ((h.prodMap h').comp fun a => (a, a)) theorem UniformCauchySeqOn.prod' {β' : Type} [UniformSpace β'] {F' : ι → α → β'} (h : UniformCauchySeqOn F p s) (h' : UniformCauchySeqOn F' p s) : UniformCauchySeqOn (fun (i : ι) a => (F i a, F' i a)) p s := fun u hu => have hh : Tendsto (fun x : ι => (x, x)) p (p ×ˢ p) := tendsto_diag (hh.prodMap hh).eventually ((h.prod h') u hu) /-- If a sequence of functions is uniformly Cauchy on a set, then the values at each point form a Cauchy sequence. -/ theorem UniformCauchySeqOn.cauchy_map [hp : NeBot p] (hf : UniformCauchySeqOn F p s) (hx : x ∈ s) : Cauchy (map (fun i => F i x) p) := by simp only [cauchy_map_iff, hp, true_and] intro u hu rw [mem_map] filter_upwards [hf u hu] with p hp using hp x hx /-- If a sequence of functions is uniformly Cauchy on a set, then the values at each point form a Cauchy sequence. See `UniformCauchSeqOn.cauchy_map` for the non-`atTop` case. -/ theorem UniformCauchySeqOn.cauchySeq [Nonempty ι] [SemilatticeSup ι] (hf : UniformCauchySeqOn F atTop s) (hx : x ∈ s) : CauchySeq fun i ↦ F i x := hf.cauchy_map (hp := atTop_neBot) hx section SeqTendsto theorem tendstoUniformlyOn_of_seq_tendstoUniformlyOn {l : Filter ι} [l.IsCountablyGenerated] (h : ∀ u : ℕ → ι, Tendsto u atTop l → TendstoUniformlyOn (fun n => F (u n)) f atTop s) : TendstoUniformlyOn F f l s := by rw [tendstoUniformlyOn_iff_tendsto, tendsto_iff_seq_tendsto] intro u hu rw [tendsto_prod_iff'] at hu specialize h (fun n => (u n).fst) hu.1 rw [tendstoUniformlyOn_iff_tendsto] at h exact h.comp (tendsto_id.prodMk hu.2) theorem TendstoUniformlyOn.seq_tendstoUniformlyOn {l : Filter ι} (h : TendstoUniformlyOn F f l s) (u : ℕ → ι) (hu : Tendsto u atTop l) : TendstoUniformlyOn (fun n => F (u n)) f atTop s := by rw [tendstoUniformlyOn_iff_tendsto] at h ⊢ exact h.comp ((hu.comp tendsto_fst).prodMk tendsto_snd) theorem tendstoUniformlyOn_iff_seq_tendstoUniformlyOn {l : Filter ι} [l.IsCountablyGenerated] : TendstoUniformlyOn F f l s ↔ ∀ u : ℕ → ι, Tendsto u atTop l → TendstoUniformlyOn (fun n => F (u n)) f atTop s := ⟨TendstoUniformlyOn.seq_tendstoUniformlyOn, tendstoUniformlyOn_of_seq_tendstoUniformlyOn⟩ theorem tendstoUniformly_iff_seq_tendstoUniformly {l : Filter ι} [l.IsCountablyGenerated] : TendstoUniformly F f l ↔ ∀ u : ℕ → ι, Tendsto u atTop l → TendstoUniformly (fun n => F (u n)) f atTop := by simp_rw [← tendstoUniformlyOn_univ] exact tendstoUniformlyOn_iff_seq_tendstoUniformlyOn end SeqTendsto section variable [NeBot p] {L : ι → β} {ℓ : β} theorem TendstoUniformlyOnFilter.tendsto_of_eventually_tendsto (h1 : TendstoUniformlyOnFilter F f p p') (h2 : ∀ᶠ i in p, Tendsto (F i) p' (𝓝 (L i))) (h3 : Tendsto L p (𝓝 ℓ)) : Tendsto f p' (𝓝 ℓ) := by rw [tendsto_nhds_left] intro s hs rw [mem_map, Set.preimage, ← eventually_iff] obtain ⟨t, ht, hts⟩ := comp3_mem_uniformity hs have p1 : ∀ᶠ i in p, (L i, ℓ) ∈ t := tendsto_nhds_left.mp h3 ht have p2 : ∀ᶠ i in p, ∀ᶠ x in p', (F i x, L i) ∈ t := by filter_upwards [h2] with i h2 using tendsto_nhds_left.mp h2 ht have p3 : ∀ᶠ i in p, ∀ᶠ x in p', (f x, F i x) ∈ t := (h1 t ht).curry obtain ⟨i, p4, p5, p6⟩ := (p1.and (p2.and p3)).exists filter_upwards [p5, p6] with x p5 p6 using hts ⟨F i x, p6, L i, p5, p4⟩ theorem TendstoUniformly.tendsto_of_eventually_tendsto (h1 : TendstoUniformly F f p) (h2 : ∀ᶠ i in p, Tendsto (F i) p' (𝓝 (L i))) (h3 : Tendsto L p (𝓝 ℓ)) : Tendsto f p' (𝓝 ℓ) := (h1.tendstoUniformlyOnFilter.mono_right le_top).tendsto_of_eventually_tendsto h2 h3 end		Mathlib/Topology/UniformSpace/UniformConvergence.lean	734	751
/- 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	Mathlib/Topology/Connected/PathConnected.lean	165	165
/- Copyright (c) 2021 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Topology.MetricSpace.Lipschitz import Mathlib.Analysis.SpecialFunctions.Pow.Continuity /-! # Hölder continuous functions In this file we define Hölder continuity on a set and on the whole space. We also prove some basic properties of Hölder continuous functions. ## Main definitions * `HolderOnWith`: `f : X → Y` is said to be Hölder continuous with constant `C : ℝ≥0` and exponent `r : ℝ≥0` on a set `s`, if `edist (f x) (f y) ≤ C * edist x y ^ r` for all `x y ∈ s`; * `HolderWith`: `f : X → Y` is said to be Hölder continuous with constant `C : ℝ≥0` and exponent `r : ℝ≥0`, if `edist (f x) (f y) ≤ C * edist x y ^ r` for all `x y : X`. ## Implementation notes We use the type `ℝ≥0` (a.k.a. `NNReal`) for `C` because this type has coercion both to `ℝ` and `ℝ≥0∞`, so it can be easily used both in inequalities about `dist` and `edist`. We also use `ℝ≥0` for `r` to ensure that `d ^ r` is monotone in `d`. It might be a good idea to use `ℝ>0` for `r` but we don't have this type in `mathlib` (yet). ## Tags Hölder continuity, Lipschitz continuity -/ variable {X Y Z : Type} open Filter Set open NNReal ENNReal Topology section Emetric variable [PseudoEMetricSpace X] [PseudoEMetricSpace Y] [PseudoEMetricSpace Z] /-- A function `f : X → Y` between two `PseudoEMetricSpace`s is Hölder continuous with constant `C : ℝ≥0` and exponent `r : ℝ≥0`, if `edist (f x) (f y) ≤ C edist x y ^ r` for all `x y : X`. -/ def HolderWith (C r : ℝ≥0) (f : X → Y) : Prop := ∀ x y, edist (f x) (f y) ≤ (C : ℝ≥0∞) * edist x y ^ (r : ℝ) /-- A function `f : X → Y` between two `PseudoEMetricSpace`s is Hölder continuous with constant `C : ℝ≥0` and exponent `r : ℝ≥0` on a set `s : Set X`, if `edist (f x) (f y) ≤ C * edist x y ^ r` for all `x y ∈ s`. -/ def HolderOnWith (C r : ℝ≥0) (f : X → Y) (s : Set X) : Prop := ∀ x ∈ s, ∀ y ∈ s, edist (f x) (f y) ≤ (C : ℝ≥0∞) * edist x y ^ (r : ℝ) @[simp] theorem holderOnWith_empty (C r : ℝ≥0) (f : X → Y) : HolderOnWith C r f ∅ := fun _ hx => hx.elim @[simp] theorem holderOnWith_singleton (C r : ℝ≥0) (f : X → Y) (x : X) : HolderOnWith C r f {x} := by rintro a (rfl : a = x) b (rfl : b = a) rw [edist_self] exact zero_le _	theorem Set.Subsingleton.holderOnWith {s : Set X} (hs : s.Subsingleton) (C r : ℝ≥0) (f : X → Y) : HolderOnWith C r f s := hs.induction_on (holderOnWith_empty C r f) (holderOnWith_singleton C r f)	Mathlib/Topology/MetricSpace/Holder.lean	66	69
/- Copyright (c) 2022 Joseph Myers. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joseph Myers -/ import Mathlib.Analysis.Convex.Between import Mathlib.Analysis.Normed.Group.AddTorsor import Mathlib.Analysis.Normed.Module.Convex /-! # Sides of affine subspaces This file defines notions of two points being on the same or opposite sides of an affine subspace. ## Main definitions * `s.WSameSide x y`: The points `x` and `y` are weakly on the same side of the affine subspace `s`. * `s.SSameSide x y`: The points `x` and `y` are strictly on the same side of the affine subspace `s`. * `s.WOppSide x y`: The points `x` and `y` are weakly on opposite sides of the affine subspace `s`. * `s.SOppSide x y`: The points `x` and `y` are strictly on opposite sides of the affine subspace `s`. -/ variable {R V V' P P' : Type*} open AffineEquiv AffineMap namespace AffineSubspace section StrictOrderedCommRing variable [CommRing R] [PartialOrder R] [IsStrictOrderedRing R] [AddCommGroup V] [Module R V] [AddTorsor V P] variable [AddCommGroup V'] [Module R V'] [AddTorsor V' P'] /-- The points `x` and `y` are weakly on the same side of `s`. -/ def WSameSide (s : AffineSubspace R P) (x y : P) : Prop := ∃ᵉ (p₁ ∈ s) (p₂ ∈ s), SameRay R (x -ᵥ p₁) (y -ᵥ p₂) /-- The points `x` and `y` are strictly on the same side of `s`. -/ def SSameSide (s : AffineSubspace R P) (x y : P) : Prop := s.WSameSide x y ∧ x ∉ s ∧ y ∉ s /-- The points `x` and `y` are weakly on opposite sides of `s`. -/ def WOppSide (s : AffineSubspace R P) (x y : P) : Prop := ∃ᵉ (p₁ ∈ s) (p₂ ∈ s), SameRay R (x -ᵥ p₁) (p₂ -ᵥ y) /-- The points `x` and `y` are strictly on opposite sides of `s`. -/ def SOppSide (s : AffineSubspace R P) (x y : P) : Prop := s.WOppSide x y ∧ x ∉ s ∧ y ∉ s theorem WSameSide.map {s : AffineSubspace R P} {x y : P} (h : s.WSameSide x y) (f : P →ᵃ[R] P') : (s.map f).WSameSide (f x) (f y) := by rcases h with ⟨p₁, hp₁, p₂, hp₂, h⟩ refine ⟨f p₁, mem_map_of_mem f hp₁, f p₂, mem_map_of_mem f hp₂, ?_⟩ simp_rw [← linearMap_vsub] exact h.map f.linear theorem _root_.Function.Injective.wSameSide_map_iff {s : AffineSubspace R P} {x y : P} {f : P →ᵃ[R] P'} (hf : Function.Injective f) : (s.map f).WSameSide (f x) (f y) ↔ s.WSameSide x y := by refine ⟨fun h => ?_, fun h => h.map _⟩ rcases h with ⟨fp₁, hfp₁, fp₂, hfp₂, h⟩ rw [mem_map] at hfp₁ hfp₂ rcases hfp₁ with ⟨p₁, hp₁, rfl⟩ rcases hfp₂ with ⟨p₂, hp₂, rfl⟩ refine ⟨p₁, hp₁, p₂, hp₂, ?_⟩ simp_rw [← linearMap_vsub, (f.linear_injective_iff.2 hf).sameRay_map_iff] at h exact h theorem _root_.Function.Injective.sSameSide_map_iff {s : AffineSubspace R P} {x y : P} {f : P →ᵃ[R] P'} (hf : Function.Injective f) : (s.map f).SSameSide (f x) (f y) ↔ s.SSameSide x y := by simp_rw [SSameSide, hf.wSameSide_map_iff, mem_map_iff_mem_of_injective hf] @[simp] theorem _root_.AffineEquiv.wSameSide_map_iff {s : AffineSubspace R P} {x y : P} (f : P ≃ᵃ[R] P') : (s.map ↑f).WSameSide (f x) (f y) ↔ s.WSameSide x y := (show Function.Injective f.toAffineMap from f.injective).wSameSide_map_iff @[simp] theorem _root_.AffineEquiv.sSameSide_map_iff {s : AffineSubspace R P} {x y : P} (f : P ≃ᵃ[R] P') : (s.map ↑f).SSameSide (f x) (f y) ↔ s.SSameSide x y := (show Function.Injective f.toAffineMap from f.injective).sSameSide_map_iff theorem WOppSide.map {s : AffineSubspace R P} {x y : P} (h : s.WOppSide x y) (f : P →ᵃ[R] P') : (s.map f).WOppSide (f x) (f y) := by rcases h with ⟨p₁, hp₁, p₂, hp₂, h⟩ refine ⟨f p₁, mem_map_of_mem f hp₁, f p₂, mem_map_of_mem f hp₂, ?_⟩ simp_rw [← linearMap_vsub] exact h.map f.linear theorem _root_.Function.Injective.wOppSide_map_iff {s : AffineSubspace R P} {x y : P} {f : P →ᵃ[R] P'} (hf : Function.Injective f) : (s.map f).WOppSide (f x) (f y) ↔ s.WOppSide x y := by refine ⟨fun h => ?_, fun h => h.map _⟩ rcases h with ⟨fp₁, hfp₁, fp₂, hfp₂, h⟩ rw [mem_map] at hfp₁ hfp₂ rcases hfp₁ with ⟨p₁, hp₁, rfl⟩ rcases hfp₂ with ⟨p₂, hp₂, rfl⟩ refine ⟨p₁, hp₁, p₂, hp₂, ?_⟩ simp_rw [← linearMap_vsub, (f.linear_injective_iff.2 hf).sameRay_map_iff] at h exact h theorem _root_.Function.Injective.sOppSide_map_iff {s : AffineSubspace R P} {x y : P} {f : P →ᵃ[R] P'} (hf : Function.Injective f) : (s.map f).SOppSide (f x) (f y) ↔ s.SOppSide x y := by simp_rw [SOppSide, hf.wOppSide_map_iff, mem_map_iff_mem_of_injective hf] @[simp] theorem _root_.AffineEquiv.wOppSide_map_iff {s : AffineSubspace R P} {x y : P} (f : P ≃ᵃ[R] P') : (s.map ↑f).WOppSide (f x) (f y) ↔ s.WOppSide x y := (show Function.Injective f.toAffineMap from f.injective).wOppSide_map_iff @[simp] theorem _root_.AffineEquiv.sOppSide_map_iff {s : AffineSubspace R P} {x y : P} (f : P ≃ᵃ[R] P') : (s.map ↑f).SOppSide (f x) (f y) ↔ s.SOppSide x y := (show Function.Injective f.toAffineMap from f.injective).sOppSide_map_iff theorem WSameSide.nonempty {s : AffineSubspace R P} {x y : P} (h : s.WSameSide x y) : (s : Set P).Nonempty := ⟨h.choose, h.choose_spec.left⟩ theorem SSameSide.nonempty {s : AffineSubspace R P} {x y : P} (h : s.SSameSide x y) : (s : Set P).Nonempty := ⟨h.1.choose, h.1.choose_spec.left⟩ theorem WOppSide.nonempty {s : AffineSubspace R P} {x y : P} (h : s.WOppSide x y) : (s : Set P).Nonempty := ⟨h.choose, h.choose_spec.left⟩ theorem SOppSide.nonempty {s : AffineSubspace R P} {x y : P} (h : s.SOppSide x y) : (s : Set P).Nonempty := ⟨h.1.choose, h.1.choose_spec.left⟩ theorem SSameSide.wSameSide {s : AffineSubspace R P} {x y : P} (h : s.SSameSide x y) : s.WSameSide x y := h.1 theorem SSameSide.left_not_mem {s : AffineSubspace R P} {x y : P} (h : s.SSameSide x y) : x ∉ s := h.2.1 theorem SSameSide.right_not_mem {s : AffineSubspace R P} {x y : P} (h : s.SSameSide x y) : y ∉ s := h.2.2 theorem SOppSide.wOppSide {s : AffineSubspace R P} {x y : P} (h : s.SOppSide x y) : s.WOppSide x y := h.1 theorem SOppSide.left_not_mem {s : AffineSubspace R P} {x y : P} (h : s.SOppSide x y) : x ∉ s := h.2.1 theorem SOppSide.right_not_mem {s : AffineSubspace R P} {x y : P} (h : s.SOppSide x y) : y ∉ s := h.2.2 theorem wSameSide_comm {s : AffineSubspace R P} {x y : P} : s.WSameSide x y ↔ s.WSameSide y x := ⟨fun ⟨p₁, hp₁, p₂, hp₂, h⟩ => ⟨p₂, hp₂, p₁, hp₁, h.symm⟩, fun ⟨p₁, hp₁, p₂, hp₂, h⟩ => ⟨p₂, hp₂, p₁, hp₁, h.symm⟩⟩ alias ⟨WSameSide.symm, _⟩ := wSameSide_comm theorem sSameSide_comm {s : AffineSubspace R P} {x y : P} : s.SSameSide x y ↔ s.SSameSide y x := by rw [SSameSide, SSameSide, wSameSide_comm, and_comm (b := x ∉ s)] alias ⟨SSameSide.symm, _⟩ := sSameSide_comm theorem wOppSide_comm {s : AffineSubspace R P} {x y : P} : s.WOppSide x y ↔ s.WOppSide y x := by constructor · rintro ⟨p₁, hp₁, p₂, hp₂, h⟩ refine ⟨p₂, hp₂, p₁, hp₁, ?_⟩ rwa [SameRay.sameRay_comm, ← sameRay_neg_iff, neg_vsub_eq_vsub_rev, neg_vsub_eq_vsub_rev] · rintro ⟨p₁, hp₁, p₂, hp₂, h⟩ refine ⟨p₂, hp₂, p₁, hp₁, ?_⟩ rwa [SameRay.sameRay_comm, ← sameRay_neg_iff, neg_vsub_eq_vsub_rev, neg_vsub_eq_vsub_rev] alias ⟨WOppSide.symm, _⟩ := wOppSide_comm theorem sOppSide_comm {s : AffineSubspace R P} {x y : P} : s.SOppSide x y ↔ s.SOppSide y x := by rw [SOppSide, SOppSide, wOppSide_comm, and_comm (b := x ∉ s)] alias ⟨SOppSide.symm, _⟩ := sOppSide_comm theorem not_wSameSide_bot (x y : P) : ¬(⊥ : AffineSubspace R P).WSameSide x y := fun ⟨_, h, _⟩ => h.elim theorem not_sSameSide_bot (x y : P) : ¬(⊥ : AffineSubspace R P).SSameSide x y := fun h => not_wSameSide_bot x y h.wSameSide theorem not_wOppSide_bot (x y : P) : ¬(⊥ : AffineSubspace R P).WOppSide x y := fun ⟨_, h, _⟩ => h.elim theorem not_sOppSide_bot (x y : P) : ¬(⊥ : AffineSubspace R P).SOppSide x y := fun h => not_wOppSide_bot x y h.wOppSide @[simp] theorem wSameSide_self_iff {s : AffineSubspace R P} {x : P} : s.WSameSide x x ↔ (s : Set P).Nonempty := ⟨fun h => h.nonempty, fun ⟨p, hp⟩ => ⟨p, hp, p, hp, SameRay.rfl⟩⟩ theorem sSameSide_self_iff {s : AffineSubspace R P} {x : P} : s.SSameSide x x ↔ (s : Set P).Nonempty ∧ x ∉ s := ⟨fun ⟨h, hx, _⟩ => ⟨wSameSide_self_iff.1 h, hx⟩, fun ⟨h, hx⟩ => ⟨wSameSide_self_iff.2 h, hx, hx⟩⟩ theorem wSameSide_of_left_mem {s : AffineSubspace R P} {x : P} (y : P) (hx : x ∈ s) : s.WSameSide x y := by refine ⟨x, hx, x, hx, ?_⟩ rw [vsub_self] apply SameRay.zero_left theorem wSameSide_of_right_mem {s : AffineSubspace R P} (x : P) {y : P} (hy : y ∈ s) : s.WSameSide x y := (wSameSide_of_left_mem x hy).symm theorem wOppSide_of_left_mem {s : AffineSubspace R P} {x : P} (y : P) (hx : x ∈ s) : s.WOppSide x y := by refine ⟨x, hx, x, hx, ?_⟩ rw [vsub_self] apply SameRay.zero_left theorem wOppSide_of_right_mem {s : AffineSubspace R P} (x : P) {y : P} (hy : y ∈ s) : s.WOppSide x y := (wOppSide_of_left_mem x hy).symm theorem wSameSide_vadd_left_iff {s : AffineSubspace R P} {x y : P} {v : V} (hv : v ∈ s.direction) : s.WSameSide (v +ᵥ x) y ↔ s.WSameSide x y := by constructor · rintro ⟨p₁, hp₁, p₂, hp₂, h⟩ refine ⟨-v +ᵥ p₁, AffineSubspace.vadd_mem_of_mem_direction (Submodule.neg_mem _ hv) hp₁, p₂, hp₂, ?_⟩ rwa [vsub_vadd_eq_vsub_sub, sub_neg_eq_add, add_comm, ← vadd_vsub_assoc] · rintro ⟨p₁, hp₁, p₂, hp₂, h⟩ refine ⟨v +ᵥ p₁, AffineSubspace.vadd_mem_of_mem_direction hv hp₁, p₂, hp₂, ?_⟩ rwa [vadd_vsub_vadd_cancel_left] theorem wSameSide_vadd_right_iff {s : AffineSubspace R P} {x y : P} {v : V} (hv : v ∈ s.direction) : s.WSameSide x (v +ᵥ y) ↔ s.WSameSide x y := by rw [wSameSide_comm, wSameSide_vadd_left_iff hv, wSameSide_comm] theorem sSameSide_vadd_left_iff {s : AffineSubspace R P} {x y : P} {v : V} (hv : v ∈ s.direction) : s.SSameSide (v +ᵥ x) y ↔ s.SSameSide x y := by rw [SSameSide, SSameSide, wSameSide_vadd_left_iff hv, vadd_mem_iff_mem_of_mem_direction hv] theorem sSameSide_vadd_right_iff {s : AffineSubspace R P} {x y : P} {v : V} (hv : v ∈ s.direction) : s.SSameSide x (v +ᵥ y) ↔ s.SSameSide x y := by rw [sSameSide_comm, sSameSide_vadd_left_iff hv, sSameSide_comm] theorem wOppSide_vadd_left_iff {s : AffineSubspace R P} {x y : P} {v : V} (hv : v ∈ s.direction) : s.WOppSide (v +ᵥ x) y ↔ s.WOppSide x y := by constructor · rintro ⟨p₁, hp₁, p₂, hp₂, h⟩ refine ⟨-v +ᵥ p₁, AffineSubspace.vadd_mem_of_mem_direction (Submodule.neg_mem _ hv) hp₁, p₂, hp₂, ?_⟩ rwa [vsub_vadd_eq_vsub_sub, sub_neg_eq_add, add_comm, ← vadd_vsub_assoc] · rintro ⟨p₁, hp₁, p₂, hp₂, h⟩ refine ⟨v +ᵥ p₁, AffineSubspace.vadd_mem_of_mem_direction hv hp₁, p₂, hp₂, ?_⟩ rwa [vadd_vsub_vadd_cancel_left] theorem wOppSide_vadd_right_iff {s : AffineSubspace R P} {x y : P} {v : V} (hv : v ∈ s.direction) : s.WOppSide x (v +ᵥ y) ↔ s.WOppSide x y := by rw [wOppSide_comm, wOppSide_vadd_left_iff hv, wOppSide_comm] theorem sOppSide_vadd_left_iff {s : AffineSubspace R P} {x y : P} {v : V} (hv : v ∈ s.direction) : s.SOppSide (v +ᵥ x) y ↔ s.SOppSide x y := by rw [SOppSide, SOppSide, wOppSide_vadd_left_iff hv, vadd_mem_iff_mem_of_mem_direction hv] theorem sOppSide_vadd_right_iff {s : AffineSubspace R P} {x y : P} {v : V} (hv : v ∈ s.direction) : s.SOppSide x (v +ᵥ y) ↔ s.SOppSide x y := by rw [sOppSide_comm, sOppSide_vadd_left_iff hv, sOppSide_comm] theorem wSameSide_smul_vsub_vadd_left {s : AffineSubspace R P} {p₁ p₂ : P} (x : P) (hp₁ : p₁ ∈ s) (hp₂ : p₂ ∈ s) {t : R} (ht : 0 ≤ t) : s.WSameSide (t • (x -ᵥ p₁) +ᵥ p₂) x := by refine ⟨p₂, hp₂, p₁, hp₁, ?_⟩ rw [vadd_vsub] exact SameRay.sameRay_nonneg_smul_left _ ht theorem wSameSide_smul_vsub_vadd_right {s : AffineSubspace R P} {p₁ p₂ : P} (x : P) (hp₁ : p₁ ∈ s) (hp₂ : p₂ ∈ s) {t : R} (ht : 0 ≤ t) : s.WSameSide x (t • (x -ᵥ p₁) +ᵥ p₂) := (wSameSide_smul_vsub_vadd_left x hp₁ hp₂ ht).symm theorem wSameSide_lineMap_left {s : AffineSubspace R P} {x : P} (y : P) (h : x ∈ s) {t : R} (ht : 0 ≤ t) : s.WSameSide (lineMap x y t) y := wSameSide_smul_vsub_vadd_left y h h ht theorem wSameSide_lineMap_right {s : AffineSubspace R P} {x : P} (y : P) (h : x ∈ s) {t : R} (ht : 0 ≤ t) : s.WSameSide y (lineMap x y t) := (wSameSide_lineMap_left y h ht).symm theorem wOppSide_smul_vsub_vadd_left {s : AffineSubspace R P} {p₁ p₂ : P} (x : P) (hp₁ : p₁ ∈ s) (hp₂ : p₂ ∈ s) {t : R} (ht : t ≤ 0) : s.WOppSide (t • (x -ᵥ p₁) +ᵥ p₂) x := by refine ⟨p₂, hp₂, p₁, hp₁, ?_⟩ rw [vadd_vsub, ← neg_neg t, neg_smul, ← smul_neg, neg_vsub_eq_vsub_rev] exact SameRay.sameRay_nonneg_smul_left _ (neg_nonneg.2 ht) theorem wOppSide_smul_vsub_vadd_right {s : AffineSubspace R P} {p₁ p₂ : P} (x : P) (hp₁ : p₁ ∈ s) (hp₂ : p₂ ∈ s) {t : R} (ht : t ≤ 0) : s.WOppSide x (t • (x -ᵥ p₁) +ᵥ p₂) := (wOppSide_smul_vsub_vadd_left x hp₁ hp₂ ht).symm theorem wOppSide_lineMap_left {s : AffineSubspace R P} {x : P} (y : P) (h : x ∈ s) {t : R} (ht : t ≤ 0) : s.WOppSide (lineMap x y t) y := wOppSide_smul_vsub_vadd_left y h h ht theorem wOppSide_lineMap_right {s : AffineSubspace R P} {x : P} (y : P) (h : x ∈ s) {t : R} (ht : t ≤ 0) : s.WOppSide y (lineMap x y t) := (wOppSide_lineMap_left y h ht).symm theorem _root_.Wbtw.wSameSide₂₃ {s : AffineSubspace R P} {x y z : P} (h : Wbtw R x y z) (hx : x ∈ s) : s.WSameSide y z := by rcases h with ⟨t, ⟨ht0, -⟩, rfl⟩ exact wSameSide_lineMap_left z hx ht0 theorem _root_.Wbtw.wSameSide₃₂ {s : AffineSubspace R P} {x y z : P} (h : Wbtw R x y z) (hx : x ∈ s) : s.WSameSide z y := (h.wSameSide₂₃ hx).symm theorem _root_.Wbtw.wSameSide₁₂ {s : AffineSubspace R P} {x y z : P} (h : Wbtw R x y z) (hz : z ∈ s) : s.WSameSide x y := h.symm.wSameSide₃₂ hz theorem _root_.Wbtw.wSameSide₂₁ {s : AffineSubspace R P} {x y z : P} (h : Wbtw R x y z) (hz : z ∈ s) : s.WSameSide y x := h.symm.wSameSide₂₃ hz theorem _root_.Wbtw.wOppSide₁₃ {s : AffineSubspace R P} {x y z : P} (h : Wbtw R x y z) (hy : y ∈ s) : s.WOppSide x z := by rcases h with ⟨t, ⟨ht0, ht1⟩, rfl⟩ refine ⟨_, hy, _, hy, ?_⟩ rcases ht1.lt_or_eq with (ht1' \| rfl); swap · rw [lineMap_apply_one]; simp rcases ht0.lt_or_eq with (ht0' \| rfl); swap · rw [lineMap_apply_zero]; simp refine Or.inr (Or.inr ⟨1 - t, t, sub_pos.2 ht1', ht0', ?_⟩) rw [lineMap_apply, vadd_vsub_assoc, vsub_vadd_eq_vsub_sub, ← neg_vsub_eq_vsub_rev z, vsub_self] module theorem _root_.Wbtw.wOppSide₃₁ {s : AffineSubspace R P} {x y z : P} (h : Wbtw R x y z) (hy : y ∈ s) : s.WOppSide z x := h.symm.wOppSide₁₃ hy end StrictOrderedCommRing section LinearOrderedField variable [Field R] [LinearOrder R] [IsStrictOrderedRing R] [AddCommGroup V] [Module R V] [AddTorsor V P] @[simp] theorem wOppSide_self_iff {s : AffineSubspace R P} {x : P} : s.WOppSide x x ↔ x ∈ s := by constructor · rintro ⟨p₁, hp₁, p₂, hp₂, h⟩ obtain ⟨a, -, -, -, -, h₁, -⟩ := h.exists_eq_smul_add rw [add_comm, vsub_add_vsub_cancel, ← eq_vadd_iff_vsub_eq] at h₁ rw [h₁] exact s.smul_vsub_vadd_mem a hp₂ hp₁ hp₁ · exact fun h => ⟨x, h, x, h, SameRay.rfl⟩ theorem not_sOppSide_self (s : AffineSubspace R P) (x : P) : ¬s.SOppSide x x := by rw [SOppSide] simp theorem wSameSide_iff_exists_left {s : AffineSubspace R P} {x y p₁ : P} (h : p₁ ∈ s) : s.WSameSide x y ↔ x ∈ s ∨ ∃ p₂ ∈ s, SameRay R (x -ᵥ p₁) (y -ᵥ p₂) := by constructor · rintro ⟨p₁', hp₁', p₂', hp₂', h0 \| h0 \| ⟨r₁, r₂, hr₁, hr₂, hr⟩⟩ · rw [vsub_eq_zero_iff_eq] at h0 rw [h0] exact Or.inl hp₁' · refine Or.inr ⟨p₂', hp₂', ?_⟩ rw [h0] exact SameRay.zero_right _ · refine Or.inr ⟨(r₁ / r₂) • (p₁ -ᵥ p₁') +ᵥ p₂', s.smul_vsub_vadd_mem _ h hp₁' hp₂', Or.inr (Or.inr ⟨r₁, r₂, hr₁, hr₂, ?_⟩)⟩ rw [vsub_vadd_eq_vsub_sub, smul_sub, ← hr, smul_smul, mul_div_cancel₀ _ hr₂.ne.symm, ← smul_sub, vsub_sub_vsub_cancel_right] · rintro (h' \| ⟨h₁, h₂, h₃⟩) · exact wSameSide_of_left_mem y h' · exact ⟨p₁, h, h₁, h₂, h₃⟩ theorem wSameSide_iff_exists_right {s : AffineSubspace R P} {x y p₂ : P} (h : p₂ ∈ s) : s.WSameSide x y ↔ y ∈ s ∨ ∃ p₁ ∈ s, SameRay R (x -ᵥ p₁) (y -ᵥ p₂) := by rw [wSameSide_comm, wSameSide_iff_exists_left h] simp_rw [SameRay.sameRay_comm] theorem sSameSide_iff_exists_left {s : AffineSubspace R P} {x y p₁ : P} (h : p₁ ∈ s) : s.SSameSide x y ↔ x ∉ s ∧ y ∉ s ∧ ∃ p₂ ∈ s, SameRay R (x -ᵥ p₁) (y -ᵥ p₂) := by rw [SSameSide, and_comm, wSameSide_iff_exists_left h, and_assoc, and_congr_right_iff] intro hx rw [or_iff_right hx] theorem sSameSide_iff_exists_right {s : AffineSubspace R P} {x y p₂ : P} (h : p₂ ∈ s) : s.SSameSide x y ↔ x ∉ s ∧ y ∉ s ∧ ∃ p₁ ∈ s, SameRay R (x -ᵥ p₁) (y -ᵥ p₂) := by rw [sSameSide_comm, sSameSide_iff_exists_left h, ← and_assoc, and_comm (a := y ∉ s), and_assoc] simp_rw [SameRay.sameRay_comm] theorem wOppSide_iff_exists_left {s : AffineSubspace R P} {x y p₁ : P} (h : p₁ ∈ s) : s.WOppSide x y ↔ x ∈ s ∨ ∃ p₂ ∈ s, SameRay R (x -ᵥ p₁) (p₂ -ᵥ y) := by constructor · rintro ⟨p₁', hp₁', p₂', hp₂', h0 \| h0 \| ⟨r₁, r₂, hr₁, hr₂, hr⟩⟩ · rw [vsub_eq_zero_iff_eq] at h0 rw [h0] exact Or.inl hp₁' · refine Or.inr ⟨p₂', hp₂', ?_⟩ rw [h0] exact SameRay.zero_right _ · refine Or.inr ⟨(-r₁ / r₂) • (p₁ -ᵥ p₁') +ᵥ p₂', s.smul_vsub_vadd_mem _ h hp₁' hp₂', Or.inr (Or.inr ⟨r₁, r₂, hr₁, hr₂, ?_⟩)⟩ rw [vadd_vsub_assoc, ← vsub_sub_vsub_cancel_right x p₁ p₁'] linear_combination (norm := match_scalars <;> field_simp) hr ring · rintro (h' \| ⟨h₁, h₂, h₃⟩) · exact wOppSide_of_left_mem y h' · exact ⟨p₁, h, h₁, h₂, h₃⟩ theorem wOppSide_iff_exists_right {s : AffineSubspace R P} {x y p₂ : P} (h : p₂ ∈ s) : s.WOppSide x y ↔ y ∈ s ∨ ∃ p₁ ∈ s, SameRay R (x -ᵥ p₁) (p₂ -ᵥ y) := by rw [wOppSide_comm, wOppSide_iff_exists_left h] constructor · rintro (hy \| ⟨p, hp, hr⟩) · exact Or.inl hy refine Or.inr ⟨p, hp, ?_⟩ rwa [SameRay.sameRay_comm, ← sameRay_neg_iff, neg_vsub_eq_vsub_rev, neg_vsub_eq_vsub_rev] · rintro (hy \| ⟨p, hp, hr⟩) · exact Or.inl hy refine Or.inr ⟨p, hp, ?_⟩ rwa [SameRay.sameRay_comm, ← sameRay_neg_iff, neg_vsub_eq_vsub_rev, neg_vsub_eq_vsub_rev] theorem sOppSide_iff_exists_left {s : AffineSubspace R P} {x y p₁ : P} (h : p₁ ∈ s) : s.SOppSide x y ↔ x ∉ s ∧ y ∉ s ∧ ∃ p₂ ∈ s, SameRay R (x -ᵥ p₁) (p₂ -ᵥ y) := by rw [SOppSide, and_comm, wOppSide_iff_exists_left h, and_assoc, and_congr_right_iff] intro hx rw [or_iff_right hx] theorem sOppSide_iff_exists_right {s : AffineSubspace R P} {x y p₂ : P} (h : p₂ ∈ s) : s.SOppSide x y ↔ x ∉ s ∧ y ∉ s ∧ ∃ p₁ ∈ s, SameRay R (x -ᵥ p₁) (p₂ -ᵥ y) := by rw [SOppSide, and_comm, wOppSide_iff_exists_right h, and_assoc, and_congr_right_iff, and_congr_right_iff] rintro _ hy rw [or_iff_right hy] theorem WSameSide.trans {s : AffineSubspace R P} {x y z : P} (hxy : s.WSameSide x y) (hyz : s.WSameSide y z) (hy : y ∉ s) : s.WSameSide x z := by rcases hxy with ⟨p₁, hp₁, p₂, hp₂, hxy⟩ rw [wSameSide_iff_exists_left hp₂, or_iff_right hy] at hyz rcases hyz with ⟨p₃, hp₃, hyz⟩ refine ⟨p₁, hp₁, p₃, hp₃, hxy.trans hyz ?_⟩ refine fun h => False.elim ?_ rw [vsub_eq_zero_iff_eq] at h exact hy (h.symm ▸ hp₂) theorem WSameSide.trans_sSameSide {s : AffineSubspace R P} {x y z : P} (hxy : s.WSameSide x y) (hyz : s.SSameSide y z) : s.WSameSide x z := hxy.trans hyz.1 hyz.2.1 theorem WSameSide.trans_wOppSide {s : AffineSubspace R P} {x y z : P} (hxy : s.WSameSide x y) (hyz : s.WOppSide y z) (hy : y ∉ s) : s.WOppSide x z := by rcases hxy with ⟨p₁, hp₁, p₂, hp₂, hxy⟩ rw [wOppSide_iff_exists_left hp₂, or_iff_right hy] at hyz rcases hyz with ⟨p₃, hp₃, hyz⟩ refine ⟨p₁, hp₁, p₃, hp₃, hxy.trans hyz ?_⟩ refine fun h => False.elim ?_ rw [vsub_eq_zero_iff_eq] at h exact hy (h.symm ▸ hp₂) theorem WSameSide.trans_sOppSide {s : AffineSubspace R P} {x y z : P} (hxy : s.WSameSide x y) (hyz : s.SOppSide y z) : s.WOppSide x z := hxy.trans_wOppSide hyz.1 hyz.2.1 theorem SSameSide.trans_wSameSide {s : AffineSubspace R P} {x y z : P} (hxy : s.SSameSide x y) (hyz : s.WSameSide y z) : s.WSameSide x z := (hyz.symm.trans_sSameSide hxy.symm).symm theorem SSameSide.trans {s : AffineSubspace R P} {x y z : P} (hxy : s.SSameSide x y) (hyz : s.SSameSide y z) : s.SSameSide x z := ⟨hxy.wSameSide.trans_sSameSide hyz, hxy.2.1, hyz.2.2⟩ theorem SSameSide.trans_wOppSide {s : AffineSubspace R P} {x y z : P} (hxy : s.SSameSide x y) (hyz : s.WOppSide y z) : s.WOppSide x z := hxy.wSameSide.trans_wOppSide hyz hxy.2.2 theorem SSameSide.trans_sOppSide {s : AffineSubspace R P} {x y z : P} (hxy : s.SSameSide x y) (hyz : s.SOppSide y z) : s.SOppSide x z := ⟨hxy.trans_wOppSide hyz.1, hxy.2.1, hyz.2.2⟩ theorem WOppSide.trans_wSameSide {s : AffineSubspace R P} {x y z : P} (hxy : s.WOppSide x y) (hyz : s.WSameSide y z) (hy : y ∉ s) : s.WOppSide x z := (hyz.symm.trans_wOppSide hxy.symm hy).symm theorem WOppSide.trans_sSameSide {s : AffineSubspace R P} {x y z : P} (hxy : s.WOppSide x y) (hyz : s.SSameSide y z) : s.WOppSide x z := hxy.trans_wSameSide hyz.1 hyz.2.1 theorem WOppSide.trans {s : AffineSubspace R P} {x y z : P} (hxy : s.WOppSide x y) (hyz : s.WOppSide y z) (hy : y ∉ s) : s.WSameSide x z := by rcases hxy with ⟨p₁, hp₁, p₂, hp₂, hxy⟩ rw [wOppSide_iff_exists_left hp₂, or_iff_right hy] at hyz rcases hyz with ⟨p₃, hp₃, hyz⟩ rw [← sameRay_neg_iff, neg_vsub_eq_vsub_rev, neg_vsub_eq_vsub_rev] at hyz refine ⟨p₁, hp₁, p₃, hp₃, hxy.trans hyz ?_⟩ refine fun h => False.elim ?_ rw [vsub_eq_zero_iff_eq] at h exact hy (h ▸ hp₂) theorem WOppSide.trans_sOppSide {s : AffineSubspace R P} {x y z : P} (hxy : s.WOppSide x y) (hyz : s.SOppSide y z) : s.WSameSide x z := hxy.trans hyz.1 hyz.2.1 theorem SOppSide.trans_wSameSide {s : AffineSubspace R P} {x y z : P} (hxy : s.SOppSide x y) (hyz : s.WSameSide y z) : s.WOppSide x z := (hyz.symm.trans_sOppSide hxy.symm).symm theorem SOppSide.trans_sSameSide {s : AffineSubspace R P} {x y z : P} (hxy : s.SOppSide x y) (hyz : s.SSameSide y z) : s.SOppSide x z := (hyz.symm.trans_sOppSide hxy.symm).symm theorem SOppSide.trans_wOppSide {s : AffineSubspace R P} {x y z : P} (hxy : s.SOppSide x y) (hyz : s.WOppSide y z) : s.WSameSide x z := (hyz.symm.trans_sOppSide hxy.symm).symm theorem SOppSide.trans {s : AffineSubspace R P} {x y z : P} (hxy : s.SOppSide x y) (hyz : s.SOppSide y z) : s.SSameSide x z := ⟨hxy.trans_wOppSide hyz.1, hxy.2.1, hyz.2.2⟩ theorem wSameSide_and_wOppSide_iff {s : AffineSubspace R P} {x y : P} : s.WSameSide x y ∧ s.WOppSide x y ↔ x ∈ s ∨ y ∈ s := by constructor · rintro ⟨hs, ho⟩ rw [wOppSide_comm] at ho by_contra h rw [not_or] at h exact h.1 (wOppSide_self_iff.1 (hs.trans_wOppSide ho h.2)) · rintro (h \| h) · exact ⟨wSameSide_of_left_mem y h, wOppSide_of_left_mem y h⟩ · exact ⟨wSameSide_of_right_mem x h, wOppSide_of_right_mem x h⟩	theorem WSameSide.not_sOppSide {s : AffineSubspace R P} {x y : P} (h : s.WSameSide x y) : ¬s.SOppSide x y := by intro ho have hxy := wSameSide_and_wOppSide_iff.1 ⟨h, ho.1⟩ rcases hxy with (hx \| hy) · exact ho.2.1 hx · exact ho.2.2 hy theorem SSameSide.not_wOppSide {s : AffineSubspace R P} {x y : P} (h : s.SSameSide x y) :	Mathlib/Analysis/Convex/Side.lean	539	547
/- Copyright (c) 2019 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Algebra.Order.BigOperators.Ring.Finset import Mathlib.Analysis.Convex.Hull import Mathlib.LinearAlgebra.AffineSpace.Basis /-! # Convex combinations This file defines convex combinations of points in a vector space. ## Main declarations * `Finset.centerMass`: Center of mass of a finite family of points. ## Implementation notes We divide by the sum of the weights in the definition of `Finset.centerMass` because of the way mathematical arguments go: one doesn't change weights, but merely adds some. This also makes a few lemmas unconditional on the sum of the weights being `1`. -/ open Set Function Pointwise universe u u' section variable {R R' E F ι ι' α : Type} [Field R] [Field R'] [AddCommGroup E] [AddCommGroup F] [AddCommGroup α] [LinearOrder α] [Module R E] [Module R F] [Module R α] {s : Set E} /-- Center of mass of a finite collection of points with prescribed weights. Note that we require neither `0 ≤ w i` nor `∑ w = 1`. -/ def Finset.centerMass (t : Finset ι) (w : ι → R) (z : ι → E) : E := (∑ i ∈ t, w i)⁻¹ • ∑ i ∈ t, w i • z i variable (i j : ι) (c : R) (t : Finset ι) (w : ι → R) (z : ι → E) open Finset theorem Finset.centerMass_empty : (∅ : Finset ι).centerMass w z = 0 := by simp only [centerMass, sum_empty, smul_zero] theorem Finset.centerMass_pair [DecidableEq ι] (hne : i ≠ j) : ({i, j} : Finset ι).centerMass w z = (w i / (w i + w j)) • z i + (w j / (w i + w j)) • z j := by simp only [centerMass, sum_pair hne] module variable {w} theorem Finset.centerMass_insert [DecidableEq ι] (ha : i ∉ t) (hw : ∑ j ∈ t, w j ≠ 0) : (insert i t).centerMass w z = (w i / (w i + ∑ j ∈ t, w j)) • z i + ((∑ j ∈ t, w j) / (w i + ∑ j ∈ t, w j)) • t.centerMass w z := by simp only [centerMass, sum_insert ha, smul_add, (mul_smul _ _ _).symm, ← div_eq_inv_mul] congr 2 rw [div_mul_eq_mul_div, mul_inv_cancel₀ hw, one_div] theorem Finset.centerMass_singleton (hw : w i ≠ 0) : ({i} : Finset ι).centerMass w z = z i := by rw [centerMass, sum_singleton, sum_singleton] match_scalars field_simp @[simp] lemma Finset.centerMass_neg_left : t.centerMass (-w) z = t.centerMass w z := by simp [centerMass, inv_neg] lemma Finset.centerMass_smul_left {c : R'} [Module R' R] [Module R' E] [SMulCommClass R' R R] [IsScalarTower R' R R] [SMulCommClass R R' E] [IsScalarTower R' R E] (hc : c ≠ 0) : t.centerMass (c • w) z = t.centerMass w z := by simp [centerMass, -smul_assoc, smul_assoc c, ← smul_sum, smul_inv₀, smul_smul_smul_comm, hc] theorem Finset.centerMass_eq_of_sum_1 (hw : ∑ i ∈ t, w i = 1) : t.centerMass w z = ∑ i ∈ t, w i • z i := by simp only [Finset.centerMass, hw, inv_one, one_smul] theorem Finset.centerMass_smul : (t.centerMass w fun i => c • z i) = c • t.centerMass w z := by simp only [Finset.centerMass, Finset.smul_sum, (mul_smul _ _ _).symm, mul_comm c, mul_assoc] /-- A convex combination of two centers of mass is a center of mass as well. This version deals with two different index types. -/ theorem Finset.centerMass_segment' (s : Finset ι) (t : Finset ι') (ws : ι → R) (zs : ι → E) (wt : ι' → R) (zt : ι' → E) (hws : ∑ i ∈ s, ws i = 1) (hwt : ∑ i ∈ t, wt i = 1) (a b : R) (hab : a + b = 1) : a • s.centerMass ws zs + b • t.centerMass wt zt = (s.disjSum t).centerMass (Sum.elim (fun i => a ws i) fun j => b * wt j) (Sum.elim zs zt) := by rw [s.centerMass_eq_of_sum_1 _ hws, t.centerMass_eq_of_sum_1 _ hwt, smul_sum, smul_sum, ← Finset.sum_sumElim, Finset.centerMass_eq_of_sum_1] · congr with ⟨⟩ <;> simp only [Sum.elim_inl, Sum.elim_inr, mul_smul] · rw [sum_sumElim, ← mul_sum, ← mul_sum, hws, hwt, mul_one, mul_one, hab] /-- A convex combination of two centers of mass is a center of mass as well. This version works if two centers of mass share the set of original points. -/ theorem Finset.centerMass_segment (s : Finset ι) (w₁ w₂ : ι → R) (z : ι → E) (hw₁ : ∑ i ∈ s, w₁ i = 1) (hw₂ : ∑ i ∈ s, w₂ i = 1) (a b : R) (hab : a + b = 1) : a • s.centerMass w₁ z + b • s.centerMass w₂ z = s.centerMass (fun i => a * w₁ i + b * w₂ i) z := by have hw : (∑ i ∈ s, (a * w₁ i + b * w₂ i)) = 1 := by simp only [← mul_sum, sum_add_distrib, mul_one, ] simp only [Finset.centerMass_eq_of_sum_1, Finset.centerMass_eq_of_sum_1 _ _ hw, smul_sum, sum_add_distrib, add_smul, mul_smul, ] theorem Finset.centerMass_ite_eq [DecidableEq ι] (hi : i ∈ t) :	t.centerMass (fun j => if i = j then (1 : R) else 0) z = z i := by rw [Finset.centerMass_eq_of_sum_1] · trans ∑ j ∈ t, if i = j then z i else 0 · congr with i split_ifs with h exacts [h ▸ one_smul _ _, zero_smul _ _] · rw [sum_ite_eq, if_pos hi] · rw [sum_ite_eq, if_pos hi]	Mathlib/Analysis/Convex/Combination.lean	105	112
/- 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 :=	Mathlib/Algebra/Group/Indicator.lean	90	92
/- Copyright (c) 2021 Shing Tak Lam. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Shing Tak Lam -/ import Mathlib.LinearAlgebra.GeneralLinearGroup import Mathlib.LinearAlgebra.Matrix.ToLin import Mathlib.LinearAlgebra.Matrix.NonsingularInverse import Mathlib.Algebra.Star.Unitary /-! # The Unitary Group This file defines elements of the unitary group `Matrix.unitaryGroup n α`, where `α` is a `StarRing`. This consists of all `n` by `n` matrices with entries in `α` such that the star-transpose is its inverse. In addition, we define the group structure on `Matrix.unitaryGroup n α`, and the embedding into the general linear group `LinearMap.GeneralLinearGroup α (n → α)`. We also define the orthogonal group `Matrix.orthogonalGroup n β`, where `β` is a `CommRing`. ## Main Definitions * `Matrix.unitaryGroup` is the submonoid of matrices where the star-transpose is the inverse; the group structure (under multiplication) is inherited from a more general `unitary` construction. * `Matrix.UnitaryGroup.embeddingGL` is the embedding `Matrix.unitaryGroup n α → GLₙ(α)`, where `GLₙ(α)` is `LinearMap.GeneralLinearGroup α (n → α)`. * `Matrix.orthogonalGroup` is the submonoid of matrices where the transpose is the inverse. ## References * https://en.wikipedia.org/wiki/Unitary_group ## Tags matrix group, group, unitary group, orthogonal group -/ universe u v namespace Matrix open LinearMap Matrix section variable (n : Type u) [DecidableEq n] [Fintype n] variable (α : Type v) [CommRing α] [StarRing α] /-- `Matrix.unitaryGroup n` is the group of `n` by `n` matrices where the star-transpose is the inverse. -/ abbrev unitaryGroup := unitary (Matrix n n α) end variable {n : Type u} [DecidableEq n] [Fintype n] variable {α : Type v} [CommRing α] [StarRing α] {A : Matrix n n α} theorem mem_unitaryGroup_iff : A ∈ Matrix.unitaryGroup n α ↔ A * star A = 1 := by refine ⟨And.right, fun hA => ⟨?_, hA⟩⟩ simpa only [mul_eq_one_comm] using hA theorem mem_unitaryGroup_iff' : A ∈ Matrix.unitaryGroup n α ↔ star A * A = 1 := by refine ⟨And.left, fun hA => ⟨hA, ?_⟩⟩ rwa [mul_eq_one_comm] at hA theorem det_of_mem_unitary {A : Matrix n n α} (hA : A ∈ Matrix.unitaryGroup n α) : A.det ∈ unitary α := by constructor · simpa [star, det_transpose] using congr_arg det hA.1 · simpa [star, det_transpose] using congr_arg det hA.2	namespace UnitaryGroup instance coeMatrix : Coe (unitaryGroup n α) (Matrix n n α) := ⟨Subtype.val⟩	Mathlib/LinearAlgebra/UnitaryGroup.lean	76	80
/- Copyright (c) 2017 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Data.Finset.Fold import Mathlib.Data.Multiset.Bind import Mathlib.Order.SetNotation /-! # Unions of finite sets This file defines the union of a family `t : α → Finset β` of finsets bounded by a finset `s : Finset α`. ## Main declarations * `Finset.disjUnion`: Given a hypothesis `h` which states that finsets `s` and `t` are disjoint, `s.disjUnion t h` is the set such that `a ∈ disjUnion s t h` iff `a ∈ s` or `a ∈ t`; this does not require decidable equality on the type `α`. * `Finset.biUnion`: Finite unions of finsets; given an indexing function `f : α → Finset β` and an `s : Finset α`, `s.biUnion f` is the union of all finsets of the form `f a` for `a ∈ s`. ## TODO Remove `Finset.biUnion` in favour of `Finset.sup`. -/ assert_not_exists MonoidWithZero MulAction variable {α β γ : Type} {s s₁ s₂ : Finset α} {t t₁ t₂ : α → Finset β} namespace Finset section DisjiUnion /-- `disjiUnion s f h` is the set such that `a ∈ disjiUnion s f` iff `a ∈ f i` for some `i ∈ s`. It is the same as `s.biUnion f`, but it does not require decidable equality on the type. The hypothesis ensures that the sets are disjoint. -/ def disjiUnion (s : Finset α) (t : α → Finset β) (hf : (s : Set α).PairwiseDisjoint t) : Finset β := ⟨s.val.bind (Finset.val ∘ t), Multiset.nodup_bind.2 ⟨fun a _ ↦ (t a).nodup, s.nodup.pairwise fun _ ha _ hb hab ↦ disjoint_val.2 <\| hf ha hb hab⟩⟩ @[simp] lemma disjiUnion_val (s : Finset α) (t : α → Finset β) (h) : (s.disjiUnion t h).1 = s.1.bind fun a ↦ (t a).1 := rfl @[simp] lemma disjiUnion_empty (t : α → Finset β) : disjiUnion ∅ t (by simp) = ∅ := rfl @[simp] lemma mem_disjiUnion {b : β} {h} : b ∈ s.disjiUnion t h ↔ ∃ a ∈ s, b ∈ t a := by simp only [mem_def, disjiUnion_val, Multiset.mem_bind, exists_prop] @[simp, norm_cast] lemma coe_disjiUnion {h} : (s.disjiUnion t h : Set β) = ⋃ x ∈ (s : Set α), t x := by simp [Set.ext_iff, mem_disjiUnion, Set.mem_iUnion, mem_coe, imp_true_iff] @[simp] lemma disjiUnion_cons (a : α) (s : Finset α) (ha : a ∉ s) (f : α → Finset β) (H) : disjiUnion (cons a s ha) f H = (f a).disjUnion ((s.disjiUnion f) fun _ hb _ hc ↦ H (mem_cons_of_mem hb) (mem_cons_of_mem hc)) (disjoint_left.2 fun _ hb h ↦ let ⟨_, hc, h⟩ := mem_disjiUnion.mp h disjoint_left.mp (H (mem_cons_self a s) (mem_cons_of_mem hc) (ne_of_mem_of_not_mem hc ha).symm) hb h) := eq_of_veq <\| Multiset.cons_bind _ _ _ @[simp] lemma singleton_disjiUnion (a : α) {h} : Finset.disjiUnion {a} t h = t a := eq_of_veq <\| Multiset.singleton_bind _ _ lemma disjiUnion_disjiUnion (s : Finset α) (f : α → Finset β) (g : β → Finset γ) (h1 h2) : (s.disjiUnion f h1).disjiUnion g h2 = s.attach.disjiUnion (fun a ↦ ((f a).disjiUnion g) fun _ hb _ hc ↦ h2 (mem_disjiUnion.mpr ⟨_, a.prop, hb⟩) (mem_disjiUnion.mpr ⟨_, a.prop, hc⟩)) fun a _ b _ hab ↦ disjoint_left.mpr fun x hxa hxb ↦ by obtain ⟨xa, hfa, hga⟩ := mem_disjiUnion.mp hxa obtain ⟨xb, hfb, hgb⟩ := mem_disjiUnion.mp hxb refine disjoint_left.mp (h2 (mem_disjiUnion.mpr ⟨_, a.prop, hfa⟩) (mem_disjiUnion.mpr ⟨_, b.prop, hfb⟩) ?_) hga hgb rintro rfl exact disjoint_left.mp (h1 a.prop b.prop <\| Subtype.coe_injective.ne hab) hfa hfb := eq_of_veq <\| Multiset.bind_assoc.trans (Multiset.attach_bind_coe _ _).symm lemma sUnion_disjiUnion {f : α → Finset (Set β)} (I : Finset α) (hf : (I : Set α).PairwiseDisjoint f) : ⋃₀ (I.disjiUnion f hf : Set (Set β)) = ⋃ a ∈ I, ⋃₀ ↑(f a) := by ext simp only [coe_disjiUnion, Set.mem_sUnion, Set.mem_iUnion, mem_coe, exists_prop] tauto section DecidableEq variable [DecidableEq β] {s : Finset α} {t : Finset β} {f : α → β} private lemma pairwiseDisjoint_fibers : Set.PairwiseDisjoint ↑t fun a ↦ s.filter (f · = a) := fun x' hx y' hy hne ↦ by simp_rw [disjoint_left, mem_filter]; rintro i ⟨_, rfl⟩ ⟨_, rfl⟩; exact hne rfl @[simp] lemma disjiUnion_filter_eq (s : Finset α) (t : Finset β) (f : α → β) : t.disjiUnion (fun a ↦ s.filter (f · = a)) pairwiseDisjoint_fibers = s.filter fun c ↦ f c ∈ t := ext fun b => by simpa using and_comm lemma disjiUnion_filter_eq_of_maps_to (h : ∀ x ∈ s, f x ∈ t) : t.disjiUnion (fun a ↦ s.filter (f · = a)) pairwiseDisjoint_fibers = s := by simpa [filter_eq_self] end DecidableEq theorem map_disjiUnion {f : α ↪ β} {s : Finset α} {t : β → Finset γ} {h} : (s.map f).disjiUnion t h = s.disjiUnion (fun a => t (f a)) fun _ ha _ hb hab => h (mem_map_of_mem _ ha) (mem_map_of_mem _ hb) (f.injective.ne hab) := eq_of_veq <\| Multiset.bind_map _ _ _ theorem disjiUnion_map {s : Finset α} {t : α → Finset β} {f : β ↪ γ} {h} : (s.disjiUnion t h).map f = s.disjiUnion (fun a => (t a).map f) (h.mono' fun _ _ ↦ (disjoint_map _).2) := eq_of_veq <\| Multiset.map_bind _ _ _ variable {f : α → β} {op : β → β → β} [hc : Std.Commutative op] [ha : Std.Associative op] theorem fold_disjiUnion {ι : Type} {s : Finset ι} {t : ι → Finset α} {b : ι → β} {b₀ : β} (h) : (s.disjiUnion t h).fold op (s.fold op b₀ b) f = s.fold op b₀ fun i => (t i).fold op (b i) f := (congr_arg _ <\| Multiset.map_bind _ _ _).trans (Multiset.fold_bind _ _ _ _ _) end DisjiUnion section BUnion variable [DecidableEq β] /-- `Finset.biUnion s t` is the union of `t a` over `a ∈ s`. (This was formerly `bind` due to the monad structure on types with `DecidableEq`.) -/ protected def biUnion (s : Finset α) (t : α → Finset β) : Finset β := (s.1.bind fun a ↦ (t a).1).toFinset @[simp] lemma biUnion_val (s : Finset α) (t : α → Finset β) : (s.biUnion t).1 = (s.1.bind fun a ↦ (t a).1).dedup := rfl @[simp] lemma biUnion_empty : Finset.biUnion ∅ t = ∅ := rfl @[simp] lemma mem_biUnion {b : β} : b ∈ s.biUnion t ↔ ∃ a ∈ s, b ∈ t a := by simp only [mem_def, biUnion_val, Multiset.mem_dedup, Multiset.mem_bind, exists_prop] @[simp, norm_cast] lemma coe_biUnion : (s.biUnion t : Set β) = ⋃ x ∈ (s : Set α), t x := by simp [Set.ext_iff, mem_biUnion, Set.mem_iUnion, mem_coe, imp_true_iff] @[simp] lemma biUnion_insert [DecidableEq α] {a : α} : (insert a s).biUnion t = t a ∪ s.biUnion t := by aesop lemma biUnion_congr (hs : s₁ = s₂) (ht : ∀ a ∈ s₁, t₁ a = t₂ a) : s₁.biUnion t₁ = s₂.biUnion t₂ := by aesop @[simp] lemma disjiUnion_eq_biUnion (s : Finset α) (f : α → Finset β) (hf) : s.disjiUnion f hf = s.biUnion f := eq_of_veq (s.disjiUnion f hf).nodup.dedup.symm lemma biUnion_subset {s' : Finset β} : s.biUnion t ⊆ s' ↔ ∀ x ∈ s, t x ⊆ s' := by simp only [subset_iff, mem_biUnion] exact ⟨fun H a ha b hb ↦ H ⟨a, ha, hb⟩, fun H b ⟨a, ha, hb⟩ ↦ H a ha hb⟩ @[simp] lemma singleton_biUnion {a : α} : Finset.biUnion {a} t = t a := by classical rw [← insert_empty_eq, biUnion_insert, biUnion_empty, union_empty] lemma biUnion_inter (s : Finset α) (f : α → Finset β) (t : Finset β) : s.biUnion f ∩ t = s.biUnion fun x ↦ f x ∩ t := by ext x simp only [mem_biUnion, mem_inter] tauto lemma inter_biUnion (t : Finset β) (s : Finset α) (f : α → Finset β) : t ∩ s.biUnion f = s.biUnion fun x ↦ t ∩ f x := by rw [inter_comm, biUnion_inter] simp [inter_comm] lemma biUnion_biUnion [DecidableEq γ] (s : Finset α) (f : α → Finset β) (g : β → Finset γ) : (s.biUnion f).biUnion g = s.biUnion fun a ↦ (f a).biUnion g := by ext simp only [Finset.mem_biUnion, exists_prop] simp_rw [← exists_and_right, ← exists_and_left, and_assoc] rw [exists_comm] lemma bind_toFinset [DecidableEq α] (s : Multiset α) (t : α → Multiset β) : (s.bind t).toFinset = s.toFinset.biUnion fun a ↦ (t a).toFinset := ext fun x ↦ by simp only [Multiset.mem_toFinset, mem_biUnion, Multiset.mem_bind, exists_prop] lemma biUnion_mono (h : ∀ a ∈ s, t₁ a ⊆ t₂ a) : s.biUnion t₁ ⊆ s.biUnion t₂ := by have : ∀ b a, a ∈ s → b ∈ t₁ a → ∃ a : α, a ∈ s ∧ b ∈ t₂ a := fun b a ha hb ↦ ⟨a, ha, Finset.mem_of_subset (h a ha) hb⟩ simpa only [subset_iff, mem_biUnion, exists_imp, and_imp, exists_prop] lemma biUnion_subset_biUnion_of_subset_left (t : α → Finset β) (h : s₁ ⊆ s₂) : s₁.biUnion t ⊆ s₂.biUnion t := fun x ↦ by simp only [and_imp, mem_biUnion, exists_prop]; exact Exists.imp fun a ha ↦ ⟨h ha.1, ha.2⟩	lemma subset_biUnion_of_mem (u : α → Finset β) {x : α} (xs : x ∈ s) : u x ⊆ s.biUnion u := singleton_biUnion.superset.trans <\|	Mathlib/Data/Finset/Union.lean	200	202
/- Copyright (c) 2021 Alex J. Best. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Alex J. Best -/ import Mathlib.Analysis.Convex.Body import Mathlib.Analysis.Convex.Measure import Mathlib.MeasureTheory.Group.FundamentalDomain /-! # Geometry of numbers In this file we prove some of the fundamental theorems in the geometry of numbers, as studied by Hermann Minkowski. ## Main results * `exists_pair_mem_lattice_not_disjoint_vadd`: Blichfeldt's principle, existence of two distinct points in a subgroup such that the translates of a set by these two points are not disjoint when the covolume of the subgroup is larger than the volume of the set. * `exists_ne_zero_mem_lattice_of_measure_mul_two_pow_lt_measure`: Minkowski's theorem, existence of a non-zero lattice point inside a convex symmetric domain of large enough volume. ## TODO * Calculate the volume of the fundamental domain of a finite index subgroup * Voronoi diagrams * See [Pete L. Clark, Abstract Geometry of Numbers: Linear Forms (arXiv)](https://arxiv.org/abs/1405.2119) for some more ideas. ## References * [Pete L. Clark, Geometry of Numbers with Applications to Number Theory][clark_gon] p.28 -/ namespace MeasureTheory open ENNReal Module MeasureTheory MeasureTheory.Measure Set Filter open scoped Pointwise NNReal variable {E L : Type} [MeasurableSpace E] {μ : Measure E} {F s : Set E} /-- Blichfeldt's Theorem*. If the volume of the set `s` is larger than the covolume of the countable subgroup `L` of `E`, then there exist two distinct points `x, y ∈ L` such that `(x + s)` and `(y + s)` are not disjoint. -/ theorem exists_pair_mem_lattice_not_disjoint_vadd [AddGroup L] [Countable L] [AddAction L E] [MeasurableSpace L] [MeasurableVAdd L E] [VAddInvariantMeasure L E μ]	(fund : IsAddFundamentalDomain L F μ) (hS : NullMeasurableSet s μ) (h : μ F < μ s) : ∃ x y : L, x ≠ y ∧ ¬Disjoint (x +ᵥ s) (y +ᵥ s) := by contrapose! h exact ((fund.measure_eq_tsum _).trans (measure_iUnion₀ (Pairwise.mono h fun i j hij => (hij.mono inf_le_left inf_le_left).aedisjoint) fun _ => (hS.vadd _).inter fund.nullMeasurableSet).symm).trans_le (measure_mono <\| Set.iUnion_subset fun _ => Set.inter_subset_right) /-- The Minkowski Convex Body Theorem. If `s` is a convex symmetric domain of `E` whose volume	Mathlib/MeasureTheory/Group/GeometryOfNumbers.lean	50	58
/- Copyright (c) 2014 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Algebra.Divisibility.Hom import Mathlib.Algebra.Group.Even import Mathlib.Algebra.Group.Nat.Hom import Mathlib.Algebra.Ring.Hom.Defs import Mathlib.Algebra.Ring.Nat /-! # Cast of natural numbers (additional theorems) This file proves additional properties about the canonical homomorphism from the natural numbers into an additive monoid with a one (`Nat.cast`). ## Main declarations * `castAddMonoidHom`: `cast` bundled as an `AddMonoidHom`. * `castRingHom`: `cast` bundled as a `RingHom`. -/ assert_not_exists OrderedCommGroup Commute.zero_right Commute.add_right abs_eq_max_neg NeZero.natCast_ne -- TODO: `MulOpposite.op_natCast` was not intended to be imported -- assert_not_exists MulOpposite.op_natCast open Additive Multiplicative variable {α β : Type} namespace Nat /-- `Nat.cast : ℕ → α` as an `AddMonoidHom`. -/ def castAddMonoidHom (α : Type) [AddMonoidWithOne α] : ℕ →+ α where toFun := Nat.cast map_add' := cast_add map_zero' := cast_zero @[simp] theorem coe_castAddMonoidHom [AddMonoidWithOne α] : (castAddMonoidHom α : ℕ → α) = Nat.cast := rfl lemma _root_.Even.natCast [AddMonoidWithOne α] {n : ℕ} (hn : Even n) : Even (n : α) := hn.map <\| Nat.castAddMonoidHom α section NonAssocSemiring variable [NonAssocSemiring α] @[simp, norm_cast] lemma cast_mul (m n : ℕ) : ((m * n : ℕ) : α) = m * n := by induction n <;> simp [mul_succ, mul_add, ] variable (α) in /-- `Nat.cast : ℕ → α` as a `RingHom` -/ def castRingHom : ℕ →+ α := { castAddMonoidHom α with toFun := Nat.cast, map_one' := cast_one, map_mul' := cast_mul } @[simp, norm_cast] lemma coe_castRingHom : (castRingHom α : ℕ → α) = Nat.cast := rfl lemma _root_.nsmul_eq_mul' (a : α) (n : ℕ) : n • a = a * n := by induction n with \| zero => rw [zero_nsmul, Nat.cast_zero, mul_zero] \| succ n ih => rw [succ_nsmul, ih, Nat.cast_succ, mul_add, mul_one] @[simp] lemma _root_.nsmul_eq_mul (n : ℕ) (a : α) : n • a = n * a := by induction n with \| zero => rw [zero_nsmul, Nat.cast_zero, zero_mul] \| succ n ih => rw [succ_nsmul, ih, Nat.cast_succ, add_mul, one_mul] end NonAssocSemiring section Semiring variable [Semiring α] {m n : ℕ} @[simp, norm_cast] lemma cast_pow (m : ℕ) : ∀ n : ℕ, ↑(m ^ n) = (m ^ n : α) \| 0 => by simp \| n + 1 => by rw [_root_.pow_succ', _root_.pow_succ', cast_mul, cast_pow m n] lemma cast_dvd_cast (h : m ∣ n) : (m : α) ∣ (n : α) := map_dvd (Nat.castRingHom α) h alias _root_.Dvd.dvd.natCast := cast_dvd_cast end Semiring end Nat section AddMonoidHomClass variable {A B F : Type} [AddMonoidWithOne B] [FunLike F ℕ A] [AddMonoidWithOne A] -- these versions are primed so that the `RingHomClass` versions aren't theorem eq_natCast' [AddMonoidHomClass F ℕ A] (f : F) (h1 : f 1 = 1) : ∀ n : ℕ, f n = n \| 0 => by simp \| n + 1 => by rw [map_add, h1, eq_natCast' f h1 n, Nat.cast_add_one] theorem map_natCast' {A} [AddMonoidWithOne A] [FunLike F A B] [AddMonoidHomClass F A B] (f : F) (h : f 1 = 1) : ∀ n : ℕ, f n = n := eq_natCast' ((f : A →+ B).comp <\| Nat.castAddMonoidHom _) (by simpa) theorem map_ofNat' {A} [AddMonoidWithOne A] [FunLike F A B] [AddMonoidHomClass F A B] (f : F) (h : f 1 = 1) (n : ℕ) [n.AtLeastTwo] : f (OfNat.ofNat n) = OfNat.ofNat n := map_natCast' f h n end AddMonoidHomClass section MonoidWithZeroHomClass variable {A F : Type} [MulZeroOneClass A] [FunLike F ℕ A] /-- If two `MonoidWithZeroHom`s agree on the positive naturals they are equal. -/ theorem ext_nat'' [ZeroHomClass F ℕ A] (f g : F) (h_pos : ∀ {n : ℕ}, 0 < n → f n = g n) : f = g := by apply DFunLike.ext rintro (_ \| n) · simp · exact h_pos n.succ_pos @[ext] theorem MonoidWithZeroHom.ext_nat {f g : ℕ →*₀ A} : (∀ {n : ℕ}, 0 < n → f n = g n) → f = g := ext_nat'' f g end MonoidWithZeroHomClass	section RingHomClass variable {R S F : Type*} [NonAssocSemiring R] [NonAssocSemiring S]	Mathlib/Data/Nat/Cast/Basic.lean	127	129
/- Copyright (c) 2023 Geoffrey Irving. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: David Loeffler, Geoffrey Irving, Stefan Kebekus -/ import Mathlib.Analysis.Analytic.Composition import Mathlib.Analysis.Analytic.Linear import Mathlib.Analysis.NormedSpace.OperatorNorm.Mul import Mathlib.Analysis.Normed.Ring.Units import Mathlib.Analysis.Analytic.OfScalars /-! # Various ways to combine analytic functions We show that the following are analytic: 1. Cartesian products of analytic functions 2. Arithmetic on analytic functions: `mul`, `smul`, `inv`, `div` 3. Finite sums and products: `Finset.sum`, `Finset.prod` -/ noncomputable section open scoped Topology open Filter Asymptotics ENNReal NNReal variable {α : Type} variable {𝕜 : Type} [NontriviallyNormedField 𝕜] variable {E F G H : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] [NormedAddCommGroup F] [NormedSpace 𝕜 F] [NormedAddCommGroup G] [NormedSpace 𝕜 G] [NormedAddCommGroup H] [NormedSpace 𝕜 H] variable {𝕝 : Type} [NontriviallyNormedField 𝕝] [NormedAlgebra 𝕜 𝕝] variable {A : Type*} [NormedRing A] [NormedAlgebra 𝕜 A] /-! ### Constants are analytic -/ theorem hasFPowerSeriesOnBall_const {c : F} {e : E} : HasFPowerSeriesOnBall (fun _ => c) (constFormalMultilinearSeries 𝕜 E c) e ⊤ := by refine ⟨by simp, WithTop.top_pos, fun _ => hasSum_single 0 fun n hn => ?_⟩ simp [constFormalMultilinearSeries_apply hn] theorem hasFPowerSeriesAt_const {c : F} {e : E} : HasFPowerSeriesAt (fun _ => c) (constFormalMultilinearSeries 𝕜 E c) e := ⟨⊤, hasFPowerSeriesOnBall_const⟩ @[fun_prop] theorem analyticAt_const {v : F} {x : E} : AnalyticAt 𝕜 (fun _ => v) x := ⟨constFormalMultilinearSeries 𝕜 E v, hasFPowerSeriesAt_const⟩ theorem analyticOnNhd_const {v : F} {s : Set E} : AnalyticOnNhd 𝕜 (fun _ => v) s := fun _ _ => analyticAt_const theorem analyticWithinAt_const {v : F} {s : Set E} {x : E} : AnalyticWithinAt 𝕜 (fun _ => v) s x := analyticAt_const.analyticWithinAt theorem analyticOn_const {v : F} {s : Set E} : AnalyticOn 𝕜 (fun _ => v) s := analyticOnNhd_const.analyticOn /-! ### Addition, negation, subtraction, scalar multiplication -/ section variable {f g : E → F} {pf pg : FormalMultilinearSeries 𝕜 E F} {s : Set E} {x : E} {r : ℝ≥0∞} {c : 𝕜} theorem HasFPowerSeriesWithinOnBall.add (hf : HasFPowerSeriesWithinOnBall f pf s x r) (hg : HasFPowerSeriesWithinOnBall g pg s x r) : HasFPowerSeriesWithinOnBall (f + g) (pf + pg) s x r := { r_le := le_trans (le_min_iff.2 ⟨hf.r_le, hg.r_le⟩) (pf.min_radius_le_radius_add pg) r_pos := hf.r_pos hasSum := fun hy h'y => (hf.hasSum hy h'y).add (hg.hasSum hy h'y) } theorem HasFPowerSeriesOnBall.add (hf : HasFPowerSeriesOnBall f pf x r) (hg : HasFPowerSeriesOnBall g pg x r) : HasFPowerSeriesOnBall (f + g) (pf + pg) x r := { r_le := le_trans (le_min_iff.2 ⟨hf.r_le, hg.r_le⟩) (pf.min_radius_le_radius_add pg) r_pos := hf.r_pos hasSum := fun hy => (hf.hasSum hy).add (hg.hasSum hy) } theorem HasFPowerSeriesWithinAt.add (hf : HasFPowerSeriesWithinAt f pf s x) (hg : HasFPowerSeriesWithinAt g pg s x) : HasFPowerSeriesWithinAt (f + g) (pf + pg) s x := by rcases (hf.eventually.and hg.eventually).exists with ⟨r, hr⟩ exact ⟨r, hr.1.add hr.2⟩ theorem HasFPowerSeriesAt.add (hf : HasFPowerSeriesAt f pf x) (hg : HasFPowerSeriesAt g pg x) : HasFPowerSeriesAt (f + g) (pf + pg) x := by rcases (hf.eventually.and hg.eventually).exists with ⟨r, hr⟩ exact ⟨r, hr.1.add hr.2⟩ theorem AnalyticWithinAt.add (hf : AnalyticWithinAt 𝕜 f s x) (hg : AnalyticWithinAt 𝕜 g s x) : AnalyticWithinAt 𝕜 (f + g) s x := let ⟨_, hpf⟩ := hf let ⟨_, hqf⟩ := hg (hpf.add hqf).analyticWithinAt @[fun_prop] theorem AnalyticAt.fun_add (hf : AnalyticAt 𝕜 f x) (hg : AnalyticAt 𝕜 g x) : AnalyticAt 𝕜 (fun z ↦ f z + g z) x := let ⟨_, hpf⟩ := hf let ⟨_, hqf⟩ := hg (hpf.add hqf).analyticAt @[deprecated (since := "2025-03-11")] alias AnalyticAt.add' := AnalyticAt.fun_add @[fun_prop] theorem AnalyticAt.add (hf : AnalyticAt 𝕜 f x) (hg : AnalyticAt 𝕜 g x) : AnalyticAt 𝕜 (f + g) x := hf.fun_add hg theorem HasFPowerSeriesWithinOnBall.neg (hf : HasFPowerSeriesWithinOnBall f pf s x r) : HasFPowerSeriesWithinOnBall (-f) (-pf) s x r := { r_le := by rw [pf.radius_neg] exact hf.r_le r_pos := hf.r_pos hasSum := fun hy h'y => (hf.hasSum hy h'y).neg } theorem HasFPowerSeriesOnBall.neg (hf : HasFPowerSeriesOnBall f pf x r) : HasFPowerSeriesOnBall (-f) (-pf) x r := { r_le := by rw [pf.radius_neg] exact hf.r_le r_pos := hf.r_pos hasSum := fun hy => (hf.hasSum hy).neg } theorem HasFPowerSeriesWithinAt.neg (hf : HasFPowerSeriesWithinAt f pf s x) : HasFPowerSeriesWithinAt (-f) (-pf) s x := let ⟨_, hrf⟩ := hf hrf.neg.hasFPowerSeriesWithinAt theorem HasFPowerSeriesAt.neg (hf : HasFPowerSeriesAt f pf x) : HasFPowerSeriesAt (-f) (-pf) x := let ⟨_, hrf⟩ := hf hrf.neg.hasFPowerSeriesAt theorem AnalyticWithinAt.neg (hf : AnalyticWithinAt 𝕜 f s x) : AnalyticWithinAt 𝕜 (-f) s x := let ⟨_, hpf⟩ := hf hpf.neg.analyticWithinAt @[fun_prop] theorem AnalyticAt.fun_neg (hf : AnalyticAt 𝕜 f x) : AnalyticAt 𝕜 (fun z ↦ -f z) x := let ⟨_, hpf⟩ := hf hpf.neg.analyticAt @[fun_prop] theorem AnalyticAt.neg (hf : AnalyticAt 𝕜 f x) : AnalyticAt 𝕜 (-f) x := hf.fun_neg @[deprecated (since := "2025-03-11")] alias AnalyticAt.neg' := AnalyticAt.fun_neg theorem HasFPowerSeriesWithinOnBall.sub (hf : HasFPowerSeriesWithinOnBall f pf s x r) (hg : HasFPowerSeriesWithinOnBall g pg s x r) : HasFPowerSeriesWithinOnBall (f - g) (pf - pg) s x r := by simpa only [sub_eq_add_neg] using hf.add hg.neg theorem HasFPowerSeriesOnBall.sub (hf : HasFPowerSeriesOnBall f pf x r) (hg : HasFPowerSeriesOnBall g pg x r) : HasFPowerSeriesOnBall (f - g) (pf - pg) x r := by simpa only [sub_eq_add_neg] using hf.add hg.neg theorem HasFPowerSeriesWithinAt.sub (hf : HasFPowerSeriesWithinAt f pf s x) (hg : HasFPowerSeriesWithinAt g pg s x) : HasFPowerSeriesWithinAt (f - g) (pf - pg) s x := by simpa only [sub_eq_add_neg] using hf.add hg.neg theorem HasFPowerSeriesAt.sub (hf : HasFPowerSeriesAt f pf x) (hg : HasFPowerSeriesAt g pg x) : HasFPowerSeriesAt (f - g) (pf - pg) x := by simpa only [sub_eq_add_neg] using hf.add hg.neg theorem AnalyticWithinAt.sub (hf : AnalyticWithinAt 𝕜 f s x) (hg : AnalyticWithinAt 𝕜 g s x) : AnalyticWithinAt 𝕜 (f - g) s x := by simpa only [sub_eq_add_neg] using hf.add hg.neg @[fun_prop] theorem AnalyticAt.fun_sub (hf : AnalyticAt 𝕜 f x) (hg : AnalyticAt 𝕜 g x) : AnalyticAt 𝕜 (fun z ↦ f z - g z) x := by simpa only [sub_eq_add_neg] using hf.add hg.neg @[fun_prop] theorem AnalyticAt.sub (hf : AnalyticAt 𝕜 f x) (hg : AnalyticAt 𝕜 g x) : AnalyticAt 𝕜 (f - g) x := hf.fun_sub hg @[deprecated (since := "2025-03-11")] alias AnalyticAt.sub' := AnalyticAt.fun_sub theorem HasFPowerSeriesWithinOnBall.const_smul (hf : HasFPowerSeriesWithinOnBall f pf s x r) : HasFPowerSeriesWithinOnBall (c • f) (c • pf) s x r where r_le := le_trans hf.r_le pf.radius_le_smul r_pos := hf.r_pos hasSum := fun hy h'y => (hf.hasSum hy h'y).const_smul _ theorem HasFPowerSeriesOnBall.const_smul (hf : HasFPowerSeriesOnBall f pf x r) : HasFPowerSeriesOnBall (c • f) (c • pf) x r where r_le := le_trans hf.r_le pf.radius_le_smul r_pos := hf.r_pos hasSum := fun hy => (hf.hasSum hy).const_smul _ theorem HasFPowerSeriesWithinAt.const_smul (hf : HasFPowerSeriesWithinAt f pf s x) : HasFPowerSeriesWithinAt (c • f) (c • pf) s x := let ⟨_, hrf⟩ := hf hrf.const_smul.hasFPowerSeriesWithinAt theorem HasFPowerSeriesAt.const_smul (hf : HasFPowerSeriesAt f pf x) : HasFPowerSeriesAt (c • f) (c • pf) x := let ⟨_, hrf⟩ := hf hrf.const_smul.hasFPowerSeriesAt theorem AnalyticWithinAt.const_smul (hf : AnalyticWithinAt 𝕜 f s x) : AnalyticWithinAt 𝕜 (c • f) s x := let ⟨_, hpf⟩ := hf hpf.const_smul.analyticWithinAt @[fun_prop] theorem AnalyticAt.fun_const_smul (hf : AnalyticAt 𝕜 f x) : AnalyticAt 𝕜 (fun z ↦ c • f z) x := let ⟨_, hpf⟩ := hf hpf.const_smul.analyticAt @[fun_prop] theorem AnalyticAt.const_smul (hf : AnalyticAt 𝕜 f x) : AnalyticAt 𝕜 (c • f) x := hf.fun_const_smul @[deprecated (since := "2025-03-11")] alias AnalyticAt.const_smul' := AnalyticAt.fun_const_smul theorem AnalyticOn.add (hf : AnalyticOn 𝕜 f s) (hg : AnalyticOn 𝕜 g s) : AnalyticOn 𝕜 (f + g) s := fun z hz => (hf z hz).add (hg z hz) theorem AnalyticOnNhd.add (hf : AnalyticOnNhd 𝕜 f s) (hg : AnalyticOnNhd 𝕜 g s) : AnalyticOnNhd 𝕜 (f + g) s := fun z hz => (hf z hz).add (hg z hz) theorem AnalyticOn.neg (hf : AnalyticOn 𝕜 f s) : AnalyticOn 𝕜 (-f) s := fun z hz ↦ (hf z hz).neg theorem AnalyticOnNhd.neg (hf : AnalyticOnNhd 𝕜 f s) : AnalyticOnNhd 𝕜 (-f) s := fun z hz ↦ (hf z hz).neg theorem AnalyticOn.sub (hf : AnalyticOn 𝕜 f s) (hg : AnalyticOn 𝕜 g s) : AnalyticOn 𝕜 (f - g) s := fun z hz => (hf z hz).sub (hg z hz) theorem AnalyticOnNhd.sub (hf : AnalyticOnNhd 𝕜 f s) (hg : AnalyticOnNhd 𝕜 g s) : AnalyticOnNhd 𝕜 (f - g) s := fun z hz => (hf z hz).sub (hg z hz) end /-! ### Cartesian products are analytic -/ /-- The radius of the Cartesian product of two formal series is the minimum of their radii. -/ lemma FormalMultilinearSeries.radius_prod_eq_min (p : FormalMultilinearSeries 𝕜 E F) (q : FormalMultilinearSeries 𝕜 E G) : (p.prod q).radius = min p.radius q.radius := by apply le_antisymm · refine ENNReal.le_of_forall_nnreal_lt fun r hr => ?_ rw [le_min_iff] have := (p.prod q).isLittleO_one_of_lt_radius hr constructor all_goals apply FormalMultilinearSeries.le_radius_of_isBigO refine (isBigO_of_le _ fun n ↦ ?_).trans this.isBigO rw [norm_mul, norm_norm, norm_mul, norm_norm] refine mul_le_mul_of_nonneg_right ?_ (norm_nonneg _) rw [FormalMultilinearSeries.prod, ContinuousMultilinearMap.opNorm_prod] · apply le_max_left · apply le_max_right · refine ENNReal.le_of_forall_nnreal_lt fun r hr => ?_ rw [lt_min_iff] at hr have := ((p.isLittleO_one_of_lt_radius hr.1).add (q.isLittleO_one_of_lt_radius hr.2)).isBigO refine (p.prod q).le_radius_of_isBigO ((isBigO_of_le _ fun n ↦ ?_).trans this) rw [norm_mul, norm_norm, ← add_mul, norm_mul] refine mul_le_mul_of_nonneg_right ?_ (norm_nonneg _) rw [FormalMultilinearSeries.prod, ContinuousMultilinearMap.opNorm_prod] refine (max_le_add_of_nonneg (norm_nonneg _) (norm_nonneg _)).trans ?_ apply Real.le_norm_self lemma HasFPowerSeriesWithinOnBall.prod {e : E} {f : E → F} {g : E → G} {r s : ℝ≥0∞} {t : Set E} {p : FormalMultilinearSeries 𝕜 E F} {q : FormalMultilinearSeries 𝕜 E G} (hf : HasFPowerSeriesWithinOnBall f p t e r) (hg : HasFPowerSeriesWithinOnBall g q t e s) : HasFPowerSeriesWithinOnBall (fun x ↦ (f x, g x)) (p.prod q) t e (min r s) where r_le := by rw [p.radius_prod_eq_min] exact min_le_min hf.r_le hg.r_le r_pos := lt_min hf.r_pos hg.r_pos hasSum := by intro y h'y hy simp_rw [FormalMultilinearSeries.prod, ContinuousMultilinearMap.prod_apply] refine (hf.hasSum h'y ?_).prodMk (hg.hasSum h'y ?_) · exact EMetric.mem_ball.mpr (lt_of_lt_of_le hy (min_le_left _ _)) · exact EMetric.mem_ball.mpr (lt_of_lt_of_le hy (min_le_right _ _)) lemma HasFPowerSeriesOnBall.prod {e : E} {f : E → F} {g : E → G} {r s : ℝ≥0∞} {p : FormalMultilinearSeries 𝕜 E F} {q : FormalMultilinearSeries 𝕜 E G} (hf : HasFPowerSeriesOnBall f p e r) (hg : HasFPowerSeriesOnBall g q e s) : HasFPowerSeriesOnBall (fun x ↦ (f x, g x)) (p.prod q) e (min r s) := by rw [← hasFPowerSeriesWithinOnBall_univ] at hf hg ⊢ exact hf.prod hg lemma HasFPowerSeriesWithinAt.prod {e : E} {f : E → F} {g : E → G} {s : Set E} {p : FormalMultilinearSeries 𝕜 E F} {q : FormalMultilinearSeries 𝕜 E G} (hf : HasFPowerSeriesWithinAt f p s e) (hg : HasFPowerSeriesWithinAt g q s e) : HasFPowerSeriesWithinAt (fun x ↦ (f x, g x)) (p.prod q) s e := by rcases hf with ⟨_, hf⟩ rcases hg with ⟨_, hg⟩ exact ⟨_, hf.prod hg⟩ lemma HasFPowerSeriesAt.prod {e : E} {f : E → F} {g : E → G} {p : FormalMultilinearSeries 𝕜 E F} {q : FormalMultilinearSeries 𝕜 E G} (hf : HasFPowerSeriesAt f p e) (hg : HasFPowerSeriesAt g q e) : HasFPowerSeriesAt (fun x ↦ (f x, g x)) (p.prod q) e := by rcases hf with ⟨_, hf⟩ rcases hg with ⟨_, hg⟩ exact ⟨_, hf.prod hg⟩ /-- The Cartesian product of analytic functions is analytic. -/ lemma AnalyticWithinAt.prod {e : E} {f : E → F} {g : E → G} {s : Set E}	(hf : AnalyticWithinAt 𝕜 f s e) (hg : AnalyticWithinAt 𝕜 g s e) : AnalyticWithinAt 𝕜 (fun x ↦ (f x, g x)) s e := by rcases hf with ⟨_, hf⟩ rcases hg with ⟨_, hg⟩ exact ⟨_, hf.prod hg⟩ /-- The Cartesian product of analytic functions is analytic. -/ @[fun_prop] lemma AnalyticAt.prod {e : E} {f : E → F} {g : E → G}	Mathlib/Analysis/Analytic/Constructions.lean	322	330
/- Copyright (c) 2019 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kim Morrison, Sophie Morel -/ import Mathlib.Algebra.Category.Grp.Preadditive import Mathlib.Algebra.Equiv.TransferInstance import Mathlib.CategoryTheory.ConcreteCategory.Elementwise import Mathlib.Data.DFinsupp.BigOperators import Mathlib.Data.DFinsupp.Small import Mathlib.GroupTheory.QuotientGroup.Defs /-! # The category of additive commutative groups has all colimits. This file constructs colimits in the category of additive commutative groups, as quotients of finitely supported functions. -/ universe u' w u v open CategoryTheory Limits namespace AddCommGrp variable {J : Type u} [Category.{v} J] (F : J ⥤ AddCommGrp.{w}) namespace Colimits /-! We build the colimit of a diagram in `AddCommGrp` by constructing the free group on the disjoint union of all the abelian groups in the diagram, then taking the quotient by the abelian group laws within each abelian group, and the identifications given by the morphisms in the diagram. -/ /-- The relations between elements of the direct sum of the `F.obj j` given by the morphisms in the diagram `J`. -/ abbrev Relations [DecidableEq J] : AddSubgroup (DFinsupp (fun j ↦ F.obj j)) := AddSubgroup.closure {x \| ∃ (j j' : J) (u : j ⟶ j') (a : F.obj j), x = DFinsupp.single j' (F.map u a) - DFinsupp.single j a} /-- The candidate for the colimit of `F`, defined as the quotient of the direct sum of the commutative groups `F.obj j` by the relations given by the morphisms in the diagram. -/ def Quot [DecidableEq J] : Type (max u w) := DFinsupp (fun j ↦ F.obj j) ⧸ Relations F instance [DecidableEq J] : AddCommGroup (Quot F) := QuotientAddGroup.Quotient.addCommGroup (Relations F) /-- Inclusion of `F.obj j` into the candidate colimit. -/ def Quot.ι [DecidableEq J] (j : J) : F.obj j →+ Quot F := (QuotientAddGroup.mk' _).comp (DFinsupp.singleAddHom (fun j ↦ F.obj j) j) lemma Quot.addMonoidHom_ext [DecidableEq J] {α : Type*} [AddMonoid α] {f g : Quot F →+ α} (h : ∀ (j : J) (x : F.obj j), f (Quot.ι F j x) = g (Quot.ι F j x)) : f = g := QuotientAddGroup.addMonoidHom_ext _ (DFinsupp.addHom_ext h) variable (c : Cocone F) /-- (implementation detail) Part of the universal property of the colimit cocone, but without assuming that `Quot F` lives in the correct universe. -/ def Quot.desc [DecidableEq J] : Quot.{w} F →+ c.pt := by refine QuotientAddGroup.lift _ (DFinsupp.sumAddHom fun x => (c.ι.app x).hom) ?_ dsimp rw [AddSubgroup.closure_le] intro _ ⟨_, _, _, _, eq⟩ rw [eq] simp only [SetLike.mem_coe, AddMonoidHom.mem_ker, map_sub, DFinsupp.sumAddHom_single] change (F.map _ ≫ c.ι.app _) _ - _ = 0 rw [c.ι.naturality] simp only [Functor.const_obj_obj, Functor.const_obj_map, Category.comp_id, sub_self] @[simp] lemma Quot.ι_desc [DecidableEq J] (j : J) (x : F.obj j) : Quot.desc F c (Quot.ι F j x) = c.ι.app j x := by dsimp [desc, ι] erw [QuotientAddGroup.lift_mk'] simp @[simp] lemma Quot.map_ι [DecidableEq J] {j j' : J} {f : j ⟶ j'} (x : F.obj j) : Quot.ι F j' (F.map f x) = Quot.ι F j x := by dsimp [ι] refine eq_of_sub_eq_zero ?_ erw [← (QuotientAddGroup.mk' (Relations F)).map_sub, ← AddMonoidHom.mem_ker] rw [QuotientAddGroup.ker_mk'] simp only [DFinsupp.singleAddHom_apply] exact AddSubgroup.subset_closure ⟨j, j', f, x, rfl⟩ /-- The obvious additive map from `Quot F` to `Quot (F ⋙ uliftFunctor.{u'})`. -/ def quotToQuotUlift [DecidableEq J] : Quot F →+ Quot (F ⋙ uliftFunctor.{u'}) := by refine QuotientAddGroup.lift (Relations F) (DFinsupp.sumAddHom (fun j ↦ (Quot.ι _ j).comp AddEquiv.ulift.symm.toAddMonoidHom)) ?_ rw [AddSubgroup.closure_le] intro _ hx obtain ⟨j, j', u, a, rfl⟩ := hx rw [SetLike.mem_coe, AddMonoidHom.mem_ker, map_sub, DFinsupp.sumAddHom_single, DFinsupp.sumAddHom_single] change Quot.ι (F ⋙ uliftFunctor) j' ((F ⋙ uliftFunctor).map u (AddEquiv.ulift.symm a)) - _ = _ rw [Quot.map_ι] dsimp rw [sub_self] lemma quotToQuotUlift_ι [DecidableEq J] (j : J) (x : F.obj j) : quotToQuotUlift F (Quot.ι F j x) = Quot.ι _ j (ULift.up x) := by dsimp [quotToQuotUlift, Quot.ι] conv_lhs => erw [AddMonoidHom.comp_apply (QuotientAddGroup.mk' (Relations F)) (DFinsupp.singleAddHom _ j), QuotientAddGroup.lift_mk'] simp only [DFinsupp.singleAddHom_apply, DFinsupp.sumAddHom_single, AddMonoidHom.coe_comp, AddMonoidHom.coe_coe, Function.comp_apply] rfl /-- The obvious additive map from `Quot (F ⋙ uliftFunctor.{u'})` to `Quot F`. -/ def quotUliftToQuot [DecidableEq J] : Quot (F ⋙ uliftFunctor.{u'}) →+ Quot F := by refine QuotientAddGroup.lift (Relations (F ⋙ uliftFunctor)) (DFinsupp.sumAddHom (fun j ↦ (Quot.ι _ j).comp AddEquiv.ulift.toAddMonoidHom)) ?_ rw [AddSubgroup.closure_le] intro _ hx obtain ⟨j, j', u, a, rfl⟩ := hx rw [SetLike.mem_coe, AddMonoidHom.mem_ker, map_sub, DFinsupp.sumAddHom_single, DFinsupp.sumAddHom_single] change Quot.ι F j' (F.map u (AddEquiv.ulift a)) - _ = _ rw [Quot.map_ι] dsimp rw [sub_self]	lemma quotUliftToQuot_ι [DecidableEq J] (j : J) (x : (F ⋙ uliftFunctor.{u'}).obj j) : quotUliftToQuot F (Quot.ι _ j x) = Quot.ι F j x.down := by dsimp [quotUliftToQuot, Quot.ι] conv_lhs => erw [AddMonoidHom.comp_apply (QuotientAddGroup.mk' (Relations (F ⋙ uliftFunctor))) (DFinsupp.singleAddHom _ j), QuotientAddGroup.lift_mk']	Mathlib/Algebra/Category/Grp/Colimits.lean	138	142
/- Copyright (c) 2022 Kyle Miller. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kyle Miller -/ import Mathlib.Data.Fintype.Card import Mathlib.Algebra.BigOperators.Group.Finset.Basic /-! # Multiset coercion to type This module defines a `CoeSort` instance for multisets and gives it a `Fintype` instance. It also defines `Multiset.toEnumFinset`, which is another way to enumerate the elements of a multiset. These coercions and definitions make it easier to sum over multisets using existing `Finset` theory. ## Main definitions * A coercion from `m : Multiset α` to a `Type`. Each `x : m` has two components. The first, `x.1`, can be obtained via the coercion `↑x : α`, and it yields the underlying element of the multiset. The second, `x.2`, is a term of `Fin (m.count x)`, and its function is to ensure each term appears with the correct multiplicity. Note that this coercion requires `DecidableEq α` due to the definition using `Multiset.count`. `Multiset.toEnumFinset` is a `Finset` version of this. * `Multiset.coeEmbedding` is the embedding `m ↪ α × ℕ`, whose first component is the coercion and whose second component enumerates elements with multiplicity. * `Multiset.coeEquiv` is the equivalence `m ≃ m.toEnumFinset`. ## Tags multiset enumeration -/ variable {α β : Type} [DecidableEq α] [DecidableEq β] {m : Multiset α} namespace Multiset /-- Auxiliary definition for the `CoeSort` instance. This prevents the `CoeOut m α` instance from inadvertently applying to other sigma types. -/ def ToType (m : Multiset α) : Type _ := (x : α) × Fin (m.count x) /-- Create a type that has the same number of elements as the multiset. Terms of this type are triples `⟨x, ⟨i, h⟩⟩` where `x : α`, `i : ℕ`, and `h : i < m.count x`. This way repeated elements of a multiset appear multiple times from different values of `i`. -/ instance : CoeSort (Multiset α) (Type _) := ⟨Multiset.ToType⟩ example : DecidableEq m := inferInstanceAs <\| DecidableEq ((x : α) × Fin (m.count x)) /-- Constructor for terms of the coercion of `m` to a type. This helps Lean pick up the correct instances. -/ @[reducible, match_pattern] def mkToType (m : Multiset α) (x : α) (i : Fin (m.count x)) : m := ⟨x, i⟩ /-- As a convenience, there is a coercion from `m : Type` to `α` by projecting onto the first component. -/ instance instCoeSortMultisetType.instCoeOutToType : CoeOut m α := ⟨fun x ↦ x.1⟩ theorem coe_mk {x : α} {i : Fin (m.count x)} : ↑(m.mkToType x i) = x := rfl @[simp] lemma coe_mem {x : m} : ↑x ∈ m := Multiset.count_pos.mp (by have := x.2.2; omega) @[simp] protected theorem forall_coe (p : m → Prop) : (∀ x : m, p x) ↔ ∀ (x : α) (i : Fin (m.count x)), p ⟨x, i⟩ := Sigma.forall @[simp] protected theorem exists_coe (p : m → Prop) : (∃ x : m, p x) ↔ ∃ (x : α) (i : Fin (m.count x)), p ⟨x, i⟩ := Sigma.exists instance : Fintype { p : α × ℕ \| p.2 < m.count p.1 } := Fintype.ofFinset (m.toFinset.biUnion fun x ↦ (Finset.range (m.count x)).map ⟨_, Prod.mk_right_injective x⟩) (by rintro ⟨x, i⟩ simp only [Finset.mem_biUnion, Multiset.mem_toFinset, Finset.mem_map, Finset.mem_range, Function.Embedding.coeFn_mk, Prod.mk_inj, Set.mem_setOf_eq] simp only [← and_assoc, exists_eq_right, and_iff_right_iff_imp] exact fun h ↦ Multiset.count_pos.mp (by omega)) /-- Construct a finset whose elements enumerate the elements of the multiset `m`. The `ℕ` component is used to differentiate between equal elements: if `x` appears `n` times then `(x, 0)`, ..., and `(x, n-1)` appear in the `Finset`. -/ def toEnumFinset (m : Multiset α) : Finset (α × ℕ) := { p : α × ℕ \| p.2 < m.count p.1 }.toFinset @[simp] theorem mem_toEnumFinset (m : Multiset α) (p : α × ℕ) : p ∈ m.toEnumFinset ↔ p.2 < m.count p.1 := Set.mem_toFinset theorem mem_of_mem_toEnumFinset {p : α × ℕ} (h : p ∈ m.toEnumFinset) : p.1 ∈ m := have := (m.mem_toEnumFinset p).mp h; Multiset.count_pos.mp (by omega) @[simp] lemma toEnumFinset_filter_eq (m : Multiset α) (a : α) : {x ∈ m.toEnumFinset \| x.1 = a} = {a} ×ˢ Finset.range (m.count a) := by aesop @[simp] lemma map_toEnumFinset_fst (m : Multiset α) : m.toEnumFinset.val.map Prod.fst = m := by ext a; simp [count_map, ← Finset.filter_val, eq_comm (a := a)] @[simp] lemma image_toEnumFinset_fst (m : Multiset α) : m.toEnumFinset.image Prod.fst = m.toFinset := by rw [Finset.image, Multiset.map_toEnumFinset_fst] @[simp] lemma map_fst_le_of_subset_toEnumFinset {s : Finset (α × ℕ)} (hsm : s ⊆ m.toEnumFinset) : s.1.map Prod.fst ≤ m := by simp_rw [le_iff_count, count_map] rintro a obtain ha \| ha := (s.1.filter fun x ↦ a = x.1).card.eq_zero_or_pos · rw [ha] exact Nat.zero_le _ obtain ⟨n, han, hn⟩ : ∃ n ≥ card (s.1.filter fun x ↦ a = x.1) - 1, (a, n) ∈ s := by by_contra! h replace h : {x ∈ s \| x.1 = a} ⊆ {a} ×ˢ .range (card (s.1.filter fun x ↦ a = x.1) - 1) := by simpa +contextual [forall_swap (β := _ = a), Finset.subset_iff, imp_not_comm, not_le, Nat.lt_sub_iff_add_lt] using h have : card (s.1.filter fun x ↦ a = x.1) ≤ card (s.1.filter fun x ↦ a = x.1) - 1 := by simpa [Finset.card, eq_comm] using Finset.card_mono h omega exact Nat.le_of_pred_lt (han.trans_lt <\| by simpa using hsm hn) @[mono] theorem toEnumFinset_mono {m₁ m₂ : Multiset α} (h : m₁ ≤ m₂) : m₁.toEnumFinset ⊆ m₂.toEnumFinset := by intro p simp only [Multiset.mem_toEnumFinset] exact gt_of_ge_of_gt (Multiset.le_iff_count.mp h p.1) @[simp] theorem toEnumFinset_subset_iff {m₁ m₂ : Multiset α} : m₁.toEnumFinset ⊆ m₂.toEnumFinset ↔ m₁ ≤ m₂ := ⟨fun h ↦ by simpa using map_fst_le_of_subset_toEnumFinset h, Multiset.toEnumFinset_mono⟩ /-- The embedding from a multiset into `α × ℕ` where the second coordinate enumerates repeats. If you are looking for the function `m → α`, that would be plain `(↑)`. -/ @[simps] def coeEmbedding (m : Multiset α) : m ↪ α × ℕ where toFun x := (x, x.2) inj' := by intro ⟨x, i, hi⟩ ⟨y, j, hj⟩ rintro ⟨⟩ rfl /-- Another way to coerce a `Multiset` to a type is to go through `m.toEnumFinset` and coerce that `Finset` to a type. -/ @[simps] def coeEquiv (m : Multiset α) : m ≃ m.toEnumFinset where toFun x := ⟨m.coeEmbedding x, by rw [Multiset.mem_toEnumFinset] exact x.2.2⟩ invFun x := ⟨x.1.1, x.1.2, by rw [← Multiset.mem_toEnumFinset] exact x.2⟩ left_inv := by rintro ⟨x, i, h⟩ rfl right_inv := by rintro ⟨⟨x, i⟩, h⟩ rfl @[simp] theorem toEmbedding_coeEquiv_trans (m : Multiset α) : m.coeEquiv.toEmbedding.trans (Function.Embedding.subtype _) = m.coeEmbedding := by ext <;> rfl @[irreducible] instance fintypeCoe : Fintype m := Fintype.ofEquiv m.toEnumFinset m.coeEquiv.symm theorem map_univ_coeEmbedding (m : Multiset α) : (Finset.univ : Finset m).map m.coeEmbedding = m.toEnumFinset := by ext ⟨x, i⟩ simp only [Fin.exists_iff, Finset.mem_map, Finset.mem_univ, Multiset.coeEmbedding_apply, Prod.mk_inj, exists_true_left, Multiset.exists_coe, Multiset.coe_mk, Fin.val_mk, exists_prop, exists_eq_right_right, exists_eq_right, Multiset.mem_toEnumFinset, true_and] @[simp] theorem map_univ_coe (m : Multiset α) : (Finset.univ : Finset m).val.map (fun x : m ↦ (x : α)) = m := by have := m.map_toEnumFinset_fst rw [← m.map_univ_coeEmbedding] at this simpa only [Finset.map_val, Multiset.coeEmbedding_apply, Multiset.map_map, Function.comp_apply] using this theorem map_univ_comp_coe {β : Type} (m : Multiset α) (f : α → β) : ((Finset.univ : Finset m).val.map (f ∘ (fun x : m ↦ (x : α)))) = m.map f := by rw [← Multiset.map_map, Multiset.map_univ_coe] @[simp] theorem map_univ {β : Type} (m : Multiset α) (f : α → β) : ((Finset.univ : Finset m).val.map fun (x : m) ↦ f (x : α)) = m.map f := by simp_rw [← Function.comp_apply (f := f)] exact map_univ_comp_coe m f @[simp] theorem card_toEnumFinset (m : Multiset α) : m.toEnumFinset.card = Multiset.card m := by rw [Finset.card, ← Multiset.card_map Prod.fst m.toEnumFinset.val] congr exact m.map_toEnumFinset_fst @[simp] theorem card_coe (m : Multiset α) : Fintype.card m = Multiset.card m := by rw [Fintype.card_congr m.coeEquiv] simp only [Fintype.card_coe, card_toEnumFinset] @[to_additive] theorem prod_eq_prod_coe [CommMonoid α] (m : Multiset α) : m.prod = ∏ x : m, (x : α) := by congr simp @[to_additive] theorem prod_eq_prod_toEnumFinset [CommMonoid α] (m : Multiset α) : m.prod = ∏ x ∈ m.toEnumFinset, x.1 := by congr simp @[to_additive] theorem prod_toEnumFinset {β : Type*} [CommMonoid β] (m : Multiset α) (f : α → ℕ → β) : ∏ x ∈ m.toEnumFinset, f x.1 x.2 = ∏ x : m, f x x.2 := by rw [Fintype.prod_equiv m.coeEquiv (fun x ↦ f x x.2) fun x ↦ f x.1.1 x.1.2] · rw [← m.toEnumFinset.prod_coe_sort fun x ↦ f x.1 x.2] · intro x rfl /-- If `s = t` then there's an equivalence between the appropriate types.	-/ @[simps] def cast {s t : Multiset α} (h : s = t) : s ≃ t where toFun x := ⟨x.1, x.2.cast (by simp [h])⟩	Mathlib/Data/Multiset/Fintype.lean	234	237
/- 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, Floris van Doorn, Yury Kudryashov, Neil Strickland -/ import Mathlib.Algebra.Group.Defs import Mathlib.Algebra.GroupWithZero.Defs import Mathlib.Data.Int.Cast.Defs import Mathlib.Tactic.Spread import Mathlib.Util.AssertExists import Mathlib.Tactic.StacksAttribute /-! # Semirings and rings This file defines semirings, rings and domains. This is analogous to `Algebra.Group.Defs` and `Algebra.Group.Basic`, the difference being that the former is about `+` and `` separately, while the present file is about their interaction. ## Main definitions `Distrib`: Typeclass for distributivity of multiplication over addition. * `HasDistribNeg`: Typeclass for commutativity of negation and multiplication. This is useful when dealing with multiplicative submonoids which are closed under negation without being closed under addition, for example `Units`. * `(NonUnital)(NonAssoc)(Semi)Ring`: Typeclasses for possibly non-unital or non-associative rings and semirings. Some combinations are not defined yet because they haven't found use. For Lie Rings, there is a type synonym `CommutatorRing` defined in `Mathlib/Algebra/Algebra/NonUnitalHom.lean` turning the bracket into a multiplication so that the instance `instNonUnitalNonAssocSemiringCommutatorRing` can be defined. ## Tags `Semiring`, `CommSemiring`, `Ring`, `CommRing`, domain, `IsDomain`, nonzero, units -/ /-! Previously an import dependency on `Mathlib.Algebra.Group.Basic` had crept in. In general, the `.Defs` files in the basic algebraic hierarchy should only depend on earlier `.Defs` files, without importing `.Basic` theory development. These `assert_not_exists` statements guard against this returning. -/ assert_not_exists DivisionMonoid.toDivInvOneMonoid mul_rotate universe u v variable {α : Type u} {R : Type v} open Function /-! ### `Distrib` class -/ /-- A typeclass stating that multiplication is left and right distributive over addition. -/ class Distrib (R : Type) extends Mul R, Add R where /-- Multiplication is left distributive over addition -/ protected left_distrib : ∀ a b c : R, a (b + c) = a * b + a * c /-- Multiplication is right distributive over addition -/ protected right_distrib : ∀ a b c : R, (a + b) * c = a * c + b * c /-- A typeclass stating that multiplication is left distributive over addition. -/ class LeftDistribClass (R : Type) [Mul R] [Add R] : Prop where /-- Multiplication is left distributive over addition -/ protected left_distrib : ∀ a b c : R, a (b + c) = a * b + a * c /-- A typeclass stating that multiplication is right distributive over addition. -/ class RightDistribClass (R : Type) [Mul R] [Add R] : Prop where /-- Multiplication is right distributive over addition -/ protected right_distrib : ∀ a b c : R, (a + b) c = a * c + b * c -- see Note [lower instance priority] instance (priority := 100) Distrib.leftDistribClass (R : Type) [Distrib R] : LeftDistribClass R := ⟨Distrib.left_distrib⟩ -- see Note [lower instance priority] instance (priority := 100) Distrib.rightDistribClass (R : Type) [Distrib R] : RightDistribClass R := ⟨Distrib.right_distrib⟩ theorem left_distrib [Mul R] [Add R] [LeftDistribClass R] (a b c : R) : a * (b + c) = a * b + a * c := LeftDistribClass.left_distrib a b c alias mul_add := left_distrib theorem right_distrib [Mul R] [Add R] [RightDistribClass R] (a b c : R) : (a + b) * c = a * c + b * c := RightDistribClass.right_distrib a b c alias add_mul := right_distrib theorem distrib_three_right [Mul R] [Add R] [RightDistribClass R] (a b c d : R) : (a + b + c) * d = a * d + b * d + c * d := by simp [right_distrib] /-! ### Classes of semirings and rings We make sure that the canonical path from `NonAssocSemiring` to `Ring` passes through `Semiring`, as this is a path which is followed all the time in linear algebra where the defining semilinear map `σ : R →+* S` depends on the `NonAssocSemiring` structure of `R` and `S` while the module definition depends on the `Semiring` structure. It is not currently possible to adjust priorities by hand (see https://github.com/leanprover/lean4/issues/2115). Instead, the last declared instance is used, so we make sure that `Semiring` is declared after `NonAssocRing`, so that `Semiring -> NonAssocSemiring` is tried before `NonAssocRing -> NonAssocSemiring`. TODO: clean this once https://github.com/leanprover/lean4/issues/2115 is fixed -/ /-- A not-necessarily-unital, not-necessarily-associative semiring. See `CommutatorRing` and the documentation thereof in case you need a `NonUnitalNonAssocSemiring` instance on a Lie ring or a Lie algebra. -/ class NonUnitalNonAssocSemiring (α : Type u) extends AddCommMonoid α, Distrib α, MulZeroClass α /-- An associative but not-necessarily unital semiring. -/ class NonUnitalSemiring (α : Type u) extends NonUnitalNonAssocSemiring α, SemigroupWithZero α /-- A unital but not-necessarily-associative semiring. -/ class NonAssocSemiring (α : Type u) extends NonUnitalNonAssocSemiring α, MulZeroOneClass α, AddCommMonoidWithOne α /-- A not-necessarily-unital, not-necessarily-associative ring. -/ class NonUnitalNonAssocRing (α : Type u) extends AddCommGroup α, NonUnitalNonAssocSemiring α /-- An associative but not-necessarily unital ring. -/ class NonUnitalRing (α : Type) extends NonUnitalNonAssocRing α, NonUnitalSemiring α /-- A unital but not-necessarily-associative ring. -/ class NonAssocRing (α : Type) extends NonUnitalNonAssocRing α, NonAssocSemiring α, AddCommGroupWithOne α /-- A `Semiring` is a type with addition, multiplication, a `0` and a `1` where addition is commutative and associative, multiplication is associative and left and right distributive over addition, and `0` and `1` are additive and multiplicative identities. -/ class Semiring (α : Type u) extends NonUnitalSemiring α, NonAssocSemiring α, MonoidWithZero α /-- A `Ring` is a `Semiring` with negation making it an additive group. -/ class Ring (R : Type u) extends Semiring R, AddCommGroup R, AddGroupWithOne R /-! ### Semirings -/ section DistribMulOneClass variable [Add α] [MulOneClass α] theorem add_one_mul [RightDistribClass α] (a b : α) : (a + 1) * b = a * b + b := by rw [add_mul, one_mul] theorem mul_add_one [LeftDistribClass α] (a b : α) : a * (b + 1) = a * b + a := by rw [mul_add, mul_one] theorem one_add_mul [RightDistribClass α] (a b : α) : (1 + a) * b = b + a * b := by rw [add_mul, one_mul] theorem mul_one_add [LeftDistribClass α] (a b : α) : a * (1 + b) = a + a * b := by rw [mul_add, mul_one] end DistribMulOneClass section NonAssocSemiring variable [NonAssocSemiring α] -- Porting note: was [has_add α] [mul_one_class α] [right_distrib_class α] theorem two_mul (n : α) : 2 * n = n + n := (congrArg₂ _ one_add_one_eq_two.symm rfl).trans <\| (right_distrib 1 1 n).trans (by rw [one_mul]) -- Porting note: was [has_add α] [mul_one_class α] [left_distrib_class α] theorem mul_two (n : α) : n * 2 = n + n := (congrArg₂ _ rfl one_add_one_eq_two.symm).trans <\| (left_distrib n 1 1).trans (by rw [mul_one]) end NonAssocSemiring section MulZeroClass variable [MulZeroClass α] (P Q : Prop) [Decidable P] [Decidable Q] (a b : α) lemma ite_zero_mul : ite P a 0 * b = ite P (a * b) 0 := by simp lemma mul_ite_zero : a * ite P b 0 = ite P (a * b) 0 := by simp lemma ite_zero_mul_ite_zero : ite P a 0 * ite Q b 0 = ite (P ∧ Q) (a * b) 0 := by simp only [← ite_and, ite_mul, mul_ite, mul_zero, zero_mul, and_comm] end MulZeroClass theorem mul_boole {α} [MulZeroOneClass α] (P : Prop) [Decidable P] (a : α) : (a * if P then 1 else 0) = if P then a else 0 := by simp theorem boole_mul {α} [MulZeroOneClass α] (P : Prop) [Decidable P] (a : α) : (if P then 1 else 0) * a = if P then a else 0 := by simp /-- A not-necessarily-unital, not-necessarily-associative, but commutative semiring. -/ class NonUnitalNonAssocCommSemiring (α : Type u) extends NonUnitalNonAssocSemiring α, CommMagma α /-- A non-unital commutative semiring is a `NonUnitalSemiring` with commutative multiplication. In other words, it is a type with the following structures: additive commutative monoid (`AddCommMonoid`), commutative semigroup (`CommSemigroup`), distributive laws (`Distrib`), and multiplication by zero law (`MulZeroClass`). -/ class NonUnitalCommSemiring (α : Type u) extends NonUnitalSemiring α, CommSemigroup α /-- A commutative semiring is a semiring with commutative multiplication. -/ class CommSemiring (R : Type u) extends Semiring R, CommMonoid R -- see Note [lower instance priority] instance (priority := 100) CommSemiring.toNonUnitalCommSemiring [CommSemiring α] : NonUnitalCommSemiring α := { inferInstanceAs (CommMonoid α), inferInstanceAs (CommSemiring α) with } -- see Note [lower instance priority] instance (priority := 100) CommSemiring.toCommMonoidWithZero [CommSemiring α] : CommMonoidWithZero α := { inferInstanceAs (CommMonoid α), inferInstanceAs (CommSemiring α) with } section CommSemiring variable [CommSemiring α] theorem add_mul_self_eq (a b : α) : (a + b) * (a + b) = a * a + 2 * a * b + b * b := by simp only [two_mul, add_mul, mul_add, add_assoc, mul_comm b] lemma add_sq (a b : α) : (a + b) ^ 2 = a ^ 2 + 2 * a * b + b ^ 2 := by simp only [sq, add_mul_self_eq] lemma add_sq' (a b : α) : (a + b) ^ 2 = a ^ 2 + b ^ 2 + 2 * a * b := by rw [add_sq, add_assoc, add_comm _ (b ^ 2), add_assoc] alias add_pow_two := add_sq end CommSemiring	section HasDistribNeg	Mathlib/Algebra/Ring/Defs.lean	237	238
/- Copyright (c) 2019 Patrick Massot. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Patrick Massot -/ import Mathlib.Topology.UniformSpace.UniformEmbedding import Mathlib.Topology.UniformSpace.Equiv /-! # Abstract theory of Hausdorff completions of uniform spaces This file characterizes Hausdorff completions of a uniform space α as complete Hausdorff spaces equipped with a map from α which has dense image and induce the original uniform structure on α. Assuming these properties we "extend" uniformly continuous maps from α to complete Hausdorff spaces to the completions of α. This is the universal property expected from a completion. It is then used to extend uniformly continuous maps from α to α' to maps between completions of α and α'. This file does not construct any such completion, it only study consequences of their existence. The first advantage is that formal properties are clearly highlighted without interference from construction details. The second advantage is that this framework can then be used to compare different completion constructions. See `Topology/UniformSpace/CompareReals` for an example. Of course the comparison comes from the universal property as usual. A general explicit construction of completions is done in `UniformSpace/Completion`, leading to a functor from uniform spaces to complete Hausdorff uniform spaces that is left adjoint to the inclusion, see `UniformSpace/UniformSpaceCat` for the category packaging. ## Implementation notes A tiny technical advantage of using a characteristic predicate such as the properties listed in `AbstractCompletion` instead of stating the universal property is that the universal property derived from the predicate is more universe polymorphic. ## References We don't know any traditional text discussing this. Real world mathematics simply silently identify the results of any two constructions that lead to something one could reasonably call a completion. ## Tags uniform spaces, completion, universal property -/ noncomputable section open Filter Set Function universe u /-- A completion of `α` is the data of a complete separated uniform space (from the same universe) and a map from `α` with dense range and inducing the original uniform structure on `α`. -/ structure AbstractCompletion (α : Type u) [UniformSpace α] where /-- The underlying space of the completion. -/ space : Type u /-- A map from a space to its completion. -/ coe : α → space /-- The completion carries a uniform structure. -/ uniformStruct : UniformSpace space /-- The completion is complete. -/ complete : CompleteSpace space /-- The completion is a T₀ space. -/ separation : T0Space space /-- The map into the completion is uniform-inducing. -/ isUniformInducing : IsUniformInducing coe /-- The map into the completion has dense range. -/ dense : DenseRange coe attribute [local instance] AbstractCompletion.uniformStruct AbstractCompletion.complete AbstractCompletion.separation namespace AbstractCompletion variable {α : Type} [UniformSpace α] (pkg : AbstractCompletion α) local notation "hatα" => pkg.space local notation "ι" => pkg.coe /-- If `α` is complete, then it is an abstract completion of itself. -/ def ofComplete [T0Space α] [CompleteSpace α] : AbstractCompletion α := mk α id inferInstance inferInstance inferInstance .id denseRange_id theorem closure_range : closure (range ι) = univ := pkg.dense.closure_range theorem isDenseInducing : IsDenseInducing ι := ⟨pkg.isUniformInducing.isInducing, pkg.dense⟩ theorem uniformContinuous_coe : UniformContinuous ι := IsUniformInducing.uniformContinuous pkg.isUniformInducing theorem continuous_coe : Continuous ι := pkg.uniformContinuous_coe.continuous @[elab_as_elim] theorem induction_on {p : hatα → Prop} (a : hatα) (hp : IsClosed { a \| p a }) (ih : ∀ a, p (ι a)) : p a := isClosed_property pkg.dense hp ih a variable {β : Type} protected theorem funext [TopologicalSpace β] [T2Space β] {f g : hatα → β} (hf : Continuous f) (hg : Continuous g) (h : ∀ a, f (ι a) = g (ι a)) : f = g := funext fun a => pkg.induction_on a (isClosed_eq hf hg) h variable [UniformSpace β] section Extend /-- Extension of maps to completions -/ protected def extend (f : α → β) : hatα → β := open scoped Classical in if UniformContinuous f then pkg.isDenseInducing.extend f else fun x => f (pkg.dense.some x) variable {f : α → β} theorem extend_def (hf : UniformContinuous f) : pkg.extend f = pkg.isDenseInducing.extend f := if_pos hf theorem extend_coe [T2Space β] (hf : UniformContinuous f) (a : α) : (pkg.extend f) (ι a) = f a := by rw [pkg.extend_def hf] exact pkg.isDenseInducing.extend_eq hf.continuous a variable [CompleteSpace β] theorem uniformContinuous_extend : UniformContinuous (pkg.extend f) := by by_cases hf : UniformContinuous f · rw [pkg.extend_def hf] exact uniformContinuous_uniformly_extend pkg.isUniformInducing pkg.dense hf · unfold AbstractCompletion.extend rw [if_neg hf] exact uniformContinuous_of_const fun a b => by congr 1 theorem continuous_extend : Continuous (pkg.extend f) := pkg.uniformContinuous_extend.continuous variable [T0Space β] theorem extend_unique (hf : UniformContinuous f) {g : hatα → β} (hg : UniformContinuous g) (h : ∀ a : α, f a = g (ι a)) : pkg.extend f = g := by apply pkg.funext pkg.continuous_extend hg.continuous simpa only [pkg.extend_coe hf] using h @[simp] theorem extend_comp_coe {f : hatα → β} (hf : UniformContinuous f) : pkg.extend (f ∘ ι) = f := funext fun x => pkg.induction_on x (isClosed_eq pkg.continuous_extend hf.continuous) fun y => pkg.extend_coe (hf.comp <\| pkg.uniformContinuous_coe) y end Extend section MapSec variable (pkg' : AbstractCompletion β) local notation "hatβ" => pkg'.space local notation "ι'" => pkg'.coe /-- Lifting maps to completions -/ protected def map (f : α → β) : hatα → hatβ := pkg.extend (ι' ∘ f) local notation "map" => pkg.map pkg' variable (f : α → β) theorem uniformContinuous_map : UniformContinuous (map f) := pkg.uniformContinuous_extend @[continuity] theorem continuous_map : Continuous (map f) := pkg.continuous_extend variable {f} @[simp] theorem map_coe (hf : UniformContinuous f) (a : α) : map f (ι a) = ι' (f a) := pkg.extend_coe (pkg'.uniformContinuous_coe.comp hf) a theorem map_unique {f : α → β} {g : hatα → hatβ} (hg : UniformContinuous g) (h : ∀ a, ι' (f a) = g (ι a)) : map f = g := pkg.funext (pkg.continuous_map _ _) hg.continuous <\| by intro a change pkg.extend (ι' ∘ f) _ = _ simp_rw [Function.comp_def, h, ← comp_apply (f := g)] rw [pkg.extend_coe (hg.comp pkg.uniformContinuous_coe)] @[simp] theorem map_id : pkg.map pkg id = id := pkg.map_unique pkg uniformContinuous_id fun _ => rfl variable {γ : Type*} [UniformSpace γ] theorem extend_map [CompleteSpace γ] [T0Space γ] {f : β → γ} {g : α → β} (hf : UniformContinuous f) (hg : UniformContinuous g) : pkg'.extend f ∘ map g = pkg.extend (f ∘ g) := pkg.funext (pkg'.continuous_extend.comp (pkg.continuous_map pkg' _)) pkg.continuous_extend fun a => by rw [pkg.extend_coe (hf.comp hg), comp_apply, pkg.map_coe pkg' hg, pkg'.extend_coe hf] rfl variable (pkg'' : AbstractCompletion γ) theorem map_comp {g : β → γ} {f : α → β} (hg : UniformContinuous g) (hf : UniformContinuous f) : pkg'.map pkg'' g ∘ pkg.map pkg' f = pkg.map pkg'' (g ∘ f) := pkg.extend_map pkg' (pkg''.uniformContinuous_coe.comp hg) hf end MapSec section Compare -- We can now compare two completion packages for the same uniform space variable (pkg' : AbstractCompletion α) /-- The comparison map between two completions of the same uniform space. -/ def compare : pkg.space → pkg'.space := pkg.extend pkg'.coe	theorem uniformContinuous_compare : UniformContinuous (pkg.compare pkg') := pkg.uniformContinuous_extend theorem compare_coe (a : α) : pkg.compare pkg' (pkg.coe a) = pkg'.coe a := pkg.extend_coe pkg'.uniformContinuous_coe a	Mathlib/Topology/UniformSpace/AbstractCompletion.lean	222	228
/- Copyright (c) 2014 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Leonardo de Moura -/ import Batteries.Tactic.Congr import Mathlib.Data.Option.Basic import Mathlib.Data.Prod.Basic import Mathlib.Data.Set.Subsingleton import Mathlib.Data.Set.SymmDiff import Mathlib.Data.Set.Inclusion /-! # Images and preimages of sets ## Main definitions * `preimage f t : Set α` : the preimage f⁻¹(t) (written `f ⁻¹' t` in Lean) of a subset of β. * `range f : Set β` : the image of `univ` under `f`. Also works for `{p : Prop} (f : p → α)` (unlike `image`) ## Notation * `f ⁻¹' t` for `Set.preimage f t` * `f '' s` for `Set.image f s` ## Tags set, sets, image, preimage, pre-image, range -/ assert_not_exists WithTop OrderIso universe u v open Function Set namespace Set variable {α β γ : Type} {ι : Sort} /-! ### Inverse image -/ section Preimage variable {f : α → β} {g : β → γ} @[simp] theorem preimage_empty : f ⁻¹' ∅ = ∅ := rfl theorem preimage_congr {f g : α → β} {s : Set β} (h : ∀ x : α, f x = g x) : f ⁻¹' s = g ⁻¹' s := by congr with x simp [h] @[gcongr] theorem preimage_mono {s t : Set β} (h : s ⊆ t) : f ⁻¹' s ⊆ f ⁻¹' t := fun _ hx => h hx @[simp, mfld_simps] theorem preimage_univ : f ⁻¹' univ = univ := rfl theorem subset_preimage_univ {s : Set α} : s ⊆ f ⁻¹' univ := subset_univ _ @[simp, mfld_simps] theorem preimage_inter {s t : Set β} : f ⁻¹' (s ∩ t) = f ⁻¹' s ∩ f ⁻¹' t := rfl @[simp] theorem preimage_union {s t : Set β} : f ⁻¹' (s ∪ t) = f ⁻¹' s ∪ f ⁻¹' t := rfl @[simp] theorem preimage_compl {s : Set β} : f ⁻¹' sᶜ = (f ⁻¹' s)ᶜ := rfl @[simp] theorem preimage_diff (f : α → β) (s t : Set β) : f ⁻¹' (s \ t) = f ⁻¹' s \ f ⁻¹' t := rfl open scoped symmDiff in @[simp] lemma preimage_symmDiff {f : α → β} (s t : Set β) : f ⁻¹' (s ∆ t) = (f ⁻¹' s) ∆ (f ⁻¹' t) := rfl @[simp] theorem preimage_ite (f : α → β) (s t₁ t₂ : Set β) : f ⁻¹' s.ite t₁ t₂ = (f ⁻¹' s).ite (f ⁻¹' t₁) (f ⁻¹' t₂) := rfl @[simp] theorem preimage_setOf_eq {p : α → Prop} {f : β → α} : f ⁻¹' { a \| p a } = { a \| p (f a) } := rfl @[simp] theorem preimage_id_eq : preimage (id : α → α) = id := rfl @[mfld_simps] theorem preimage_id {s : Set α} : id ⁻¹' s = s := rfl @[simp, mfld_simps] theorem preimage_id' {s : Set α} : (fun x => x) ⁻¹' s = s := rfl @[simp] theorem preimage_const_of_mem {b : β} {s : Set β} (h : b ∈ s) : (fun _ : α => b) ⁻¹' s = univ := eq_univ_of_forall fun _ => h @[simp] theorem preimage_const_of_not_mem {b : β} {s : Set β} (h : b ∉ s) : (fun _ : α => b) ⁻¹' s = ∅ := eq_empty_of_subset_empty fun _ hx => h hx theorem preimage_const (b : β) (s : Set β) [Decidable (b ∈ s)] : (fun _ : α => b) ⁻¹' s = if b ∈ s then univ else ∅ := by split_ifs with hb exacts [preimage_const_of_mem hb, preimage_const_of_not_mem hb] /-- If preimage of each singleton under `f : α → β` is either empty or the whole type, then `f` is a constant. -/ lemma exists_eq_const_of_preimage_singleton [Nonempty β] {f : α → β} (hf : ∀ b : β, f ⁻¹' {b} = ∅ ∨ f ⁻¹' {b} = univ) : ∃ b, f = const α b := by rcases em (∃ b, f ⁻¹' {b} = univ) with ⟨b, hb⟩ \| hf' · exact ⟨b, funext fun x ↦ eq_univ_iff_forall.1 hb x⟩ · have : ∀ x b, f x ≠ b := fun x b ↦ eq_empty_iff_forall_not_mem.1 ((hf b).resolve_right fun h ↦ hf' ⟨b, h⟩) x exact ⟨Classical.arbitrary β, funext fun x ↦ absurd rfl (this x _)⟩ theorem preimage_comp {s : Set γ} : g ∘ f ⁻¹' s = f ⁻¹' (g ⁻¹' s) := rfl theorem preimage_comp_eq : preimage (g ∘ f) = preimage f ∘ preimage g := rfl theorem preimage_iterate_eq {f : α → α} {n : ℕ} : Set.preimage f^[n] = (Set.preimage f)^[n] := by induction n with \| zero => simp \| succ n ih => rw [iterate_succ, iterate_succ', preimage_comp_eq, ih] theorem preimage_preimage {g : β → γ} {f : α → β} {s : Set γ} : f ⁻¹' (g ⁻¹' s) = (fun x => g (f x)) ⁻¹' s := preimage_comp.symm theorem eq_preimage_subtype_val_iff {p : α → Prop} {s : Set (Subtype p)} {t : Set α} : s = Subtype.val ⁻¹' t ↔ ∀ (x) (h : p x), (⟨x, h⟩ : Subtype p) ∈ s ↔ x ∈ t := ⟨fun s_eq x h => by rw [s_eq] simp, fun h => ext fun ⟨x, hx⟩ => by simp [h]⟩ theorem nonempty_of_nonempty_preimage {s : Set β} {f : α → β} (hf : (f ⁻¹' s).Nonempty) : s.Nonempty := let ⟨x, hx⟩ := hf ⟨f x, hx⟩ @[simp] theorem preimage_singleton_true (p : α → Prop) : p ⁻¹' {True} = {a \| p a} := by ext; simp @[simp] theorem preimage_singleton_false (p : α → Prop) : p ⁻¹' {False} = {a \| ¬p a} := by ext; simp theorem preimage_subtype_coe_eq_compl {s u v : Set α} (hsuv : s ⊆ u ∪ v) (H : s ∩ (u ∩ v) = ∅) : ((↑) : s → α) ⁻¹' u = ((↑) ⁻¹' v)ᶜ := by ext ⟨x, x_in_s⟩ constructor · intro x_in_u x_in_v exact eq_empty_iff_forall_not_mem.mp H x ⟨x_in_s, ⟨x_in_u, x_in_v⟩⟩ · intro hx exact Or.elim (hsuv x_in_s) id fun hx' => hx.elim hx' lemma preimage_subset {s t} (hs : s ⊆ f '' t) (hf : Set.InjOn f (f ⁻¹' s)) : f ⁻¹' s ⊆ t := by rintro a ha obtain ⟨b, hb, hba⟩ := hs ha rwa [hf ha _ hba.symm] simpa [hba] end Preimage /-! ### Image of a set under a function -/ section Image variable {f : α → β} {s t : Set α} theorem image_eta (f : α → β) : f '' s = (fun x => f x) '' s := rfl theorem _root_.Function.Injective.mem_set_image {f : α → β} (hf : Injective f) {s : Set α} {a : α} : f a ∈ f '' s ↔ a ∈ s := ⟨fun ⟨_, hb, Eq⟩ => hf Eq ▸ hb, mem_image_of_mem f⟩ lemma preimage_subset_of_surjOn {t : Set β} (hf : Injective f) (h : SurjOn f s t) : f ⁻¹' t ⊆ s := fun _ hx ↦ hf.mem_set_image.1 <\| h hx theorem forall_mem_image {f : α → β} {s : Set α} {p : β → Prop} : (∀ y ∈ f '' s, p y) ↔ ∀ ⦃x⦄, x ∈ s → p (f x) := by simp theorem exists_mem_image {f : α → β} {s : Set α} {p : β → Prop} : (∃ y ∈ f '' s, p y) ↔ ∃ x ∈ s, p (f x) := by simp @[congr] theorem image_congr {f g : α → β} {s : Set α} (h : ∀ a ∈ s, f a = g a) : f '' s = g '' s := by aesop /-- A common special case of `image_congr` -/ theorem image_congr' {f g : α → β} {s : Set α} (h : ∀ x : α, f x = g x) : f '' s = g '' s := image_congr fun x _ => h x @[gcongr] lemma image_mono (h : s ⊆ t) : f '' s ⊆ f '' t := by rintro - ⟨a, ha, rfl⟩; exact mem_image_of_mem f (h ha) theorem image_comp (f : β → γ) (g : α → β) (a : Set α) : f ∘ g '' a = f '' (g '' a) := by aesop theorem image_comp_eq {g : β → γ} : image (g ∘ f) = image g ∘ image f := by ext; simp /-- A variant of `image_comp`, useful for rewriting -/ theorem image_image (g : β → γ) (f : α → β) (s : Set α) : g '' (f '' s) = (fun x => g (f x)) '' s := (image_comp g f s).symm theorem image_comm {β'} {f : β → γ} {g : α → β} {f' : α → β'} {g' : β' → γ} (h_comm : ∀ a, f (g a) = g' (f' a)) : (s.image g).image f = (s.image f').image g' := by simp_rw [image_image, h_comm] theorem _root_.Function.Semiconj.set_image {f : α → β} {ga : α → α} {gb : β → β} (h : Function.Semiconj f ga gb) : Function.Semiconj (image f) (image ga) (image gb) := fun _ => image_comm h theorem _root_.Function.Commute.set_image {f g : α → α} (h : Function.Commute f g) : Function.Commute (image f) (image g) := Function.Semiconj.set_image h /-- Image is monotone with respect to `⊆`. See `Set.monotone_image` for the statement in terms of `≤`. -/ @[gcongr] theorem image_subset {a b : Set α} (f : α → β) (h : a ⊆ b) : f '' a ⊆ f '' b := by simp only [subset_def, mem_image] exact fun x => fun ⟨w, h1, h2⟩ => ⟨w, h h1, h2⟩ /-- `Set.image` is monotone. See `Set.image_subset` for the statement in terms of `⊆`. -/ lemma monotone_image {f : α → β} : Monotone (image f) := fun _ _ => image_subset _ theorem image_union (f : α → β) (s t : Set α) : f '' (s ∪ t) = f '' s ∪ f '' t := ext fun x => ⟨by rintro ⟨a, h \| h, rfl⟩ <;> [left; right] <;> exact ⟨_, h, rfl⟩, by rintro (⟨a, h, rfl⟩ \| ⟨a, h, rfl⟩) <;> refine ⟨_, ?_, rfl⟩ · exact mem_union_left t h · exact mem_union_right s h⟩ @[simp] theorem image_empty (f : α → β) : f '' ∅ = ∅ := by ext simp theorem image_inter_subset (f : α → β) (s t : Set α) : f '' (s ∩ t) ⊆ f '' s ∩ f '' t := subset_inter (image_subset _ inter_subset_left) (image_subset _ inter_subset_right) theorem image_inter_on {f : α → β} {s t : Set α} (h : ∀ x ∈ t, ∀ y ∈ s, f x = f y → x = y) : f '' (s ∩ t) = f '' s ∩ f '' t := (image_inter_subset _ _ _).antisymm fun b ⟨⟨a₁, ha₁, h₁⟩, ⟨a₂, ha₂, h₂⟩⟩ ↦ have : a₂ = a₁ := h _ ha₂ _ ha₁ (by simp []) ⟨a₁, ⟨ha₁, this ▸ ha₂⟩, h₁⟩ theorem image_inter {f : α → β} {s t : Set α} (H : Injective f) : f '' (s ∩ t) = f '' s ∩ f '' t := image_inter_on fun _ _ _ _ h => H h theorem image_univ_of_surjective {ι : Type} {f : ι → β} (H : Surjective f) : f '' univ = univ := eq_univ_of_forall <\| by simpa [image] @[simp] theorem image_singleton {f : α → β} {a : α} : f '' {a} = {f a} := by ext simp [image, eq_comm] @[simp] theorem Nonempty.image_const {s : Set α} (hs : s.Nonempty) (a : β) : (fun _ => a) '' s = {a} := ext fun _ => ⟨fun ⟨_, _, h⟩ => h ▸ mem_singleton _, fun h => (eq_of_mem_singleton h).symm ▸ hs.imp fun _ hy => ⟨hy, rfl⟩⟩ @[simp, mfld_simps] theorem image_eq_empty {α β} {f : α → β} {s : Set α} : f '' s = ∅ ↔ s = ∅ := by simp only [eq_empty_iff_forall_not_mem] exact ⟨fun H a ha => H _ ⟨_, ha, rfl⟩, fun H b ⟨_, ha, _⟩ => H _ ha⟩ theorem preimage_compl_eq_image_compl [BooleanAlgebra α] (S : Set α) : HasCompl.compl ⁻¹' S = HasCompl.compl '' S := Set.ext fun x => ⟨fun h => ⟨xᶜ, h, compl_compl x⟩, fun h => Exists.elim h fun _ hy => (compl_eq_comm.mp hy.2).symm.subst hy.1⟩ theorem mem_compl_image [BooleanAlgebra α] (t : α) (S : Set α) : t ∈ HasCompl.compl '' S ↔ tᶜ ∈ S := by simp [← preimage_compl_eq_image_compl] @[simp] theorem image_id_eq : image (id : α → α) = id := by ext; simp /-- A variant of `image_id` -/ @[simp] theorem image_id' (s : Set α) : (fun x => x) '' s = s := by ext simp theorem image_id (s : Set α) : id '' s = s := by simp lemma image_iterate_eq {f : α → α} {n : ℕ} : image (f^[n]) = (image f)^[n] := by induction n with \| zero => simp \| succ n ih => rw [iterate_succ', iterate_succ', ← ih, image_comp_eq] theorem compl_compl_image [BooleanAlgebra α] (S : Set α) : HasCompl.compl '' (HasCompl.compl '' S) = S := by rw [← image_comp, compl_comp_compl, image_id] theorem image_insert_eq {f : α → β} {a : α} {s : Set α} : f '' insert a s = insert (f a) (f '' s) := by ext simp [and_or_left, exists_or, eq_comm, or_comm, and_comm] theorem image_pair (f : α → β) (a b : α) : f '' {a, b} = {f a, f b} := by simp only [image_insert_eq, image_singleton] theorem image_subset_preimage_of_inverse {f : α → β} {g : β → α} (I : LeftInverse g f) (s : Set α) : f '' s ⊆ g ⁻¹' s := fun _ ⟨a, h, e⟩ => e ▸ ((I a).symm ▸ h : g (f a) ∈ s) theorem preimage_subset_image_of_inverse {f : α → β} {g : β → α} (I : LeftInverse g f) (s : Set β) : f ⁻¹' s ⊆ g '' s := fun b h => ⟨f b, h, I b⟩ theorem range_inter_ssubset_iff_preimage_ssubset {f : α → β} {S S' : Set β} : range f ∩ S ⊂ range f ∩ S' ↔ f ⁻¹' S ⊂ f ⁻¹' S' := by simp only [Set.ssubset_iff_exists] apply and_congr ?_ (by aesop) constructor all_goals intro r x hx simp_all only [subset_inter_iff, inter_subset_left, true_and, mem_preimage, mem_inter_iff, mem_range, true_and] aesop theorem image_eq_preimage_of_inverse {f : α → β} {g : β → α} (h₁ : LeftInverse g f) (h₂ : RightInverse g f) : image f = preimage g := funext fun s => Subset.antisymm (image_subset_preimage_of_inverse h₁ s) (preimage_subset_image_of_inverse h₂ s) theorem mem_image_iff_of_inverse {f : α → β} {g : β → α} {b : β} {s : Set α} (h₁ : LeftInverse g f) (h₂ : RightInverse g f) : b ∈ f '' s ↔ g b ∈ s := by rw [image_eq_preimage_of_inverse h₁ h₂]; rfl theorem image_compl_subset {f : α → β} {s : Set α} (H : Injective f) : f '' sᶜ ⊆ (f '' s)ᶜ := Disjoint.subset_compl_left <\| by simp [disjoint_iff_inf_le, ← image_inter H] theorem subset_image_compl {f : α → β} {s : Set α} (H : Surjective f) : (f '' s)ᶜ ⊆ f '' sᶜ := compl_subset_iff_union.2 <\| by rw [← image_union] simp [image_univ_of_surjective H] theorem image_compl_eq {f : α → β} {s : Set α} (H : Bijective f) : f '' sᶜ = (f '' s)ᶜ := Subset.antisymm (image_compl_subset H.1) (subset_image_compl H.2) theorem subset_image_diff (f : α → β) (s t : Set α) : f '' s \ f '' t ⊆ f '' (s \ t) := by rw [diff_subset_iff, ← image_union, union_diff_self] exact image_subset f subset_union_right open scoped symmDiff in theorem subset_image_symmDiff : (f '' s) ∆ (f '' t) ⊆ f '' s ∆ t := (union_subset_union (subset_image_diff _ _ _) <\| subset_image_diff _ _ _).trans (superset_of_eq (image_union _ _ _)) theorem image_diff {f : α → β} (hf : Injective f) (s t : Set α) : f '' (s \ t) = f '' s \ f '' t := Subset.antisymm (Subset.trans (image_inter_subset _ _ _) <\| inter_subset_inter_right _ <\| image_compl_subset hf) (subset_image_diff f s t) open scoped symmDiff in theorem image_symmDiff (hf : Injective f) (s t : Set α) : f '' s ∆ t = (f '' s) ∆ (f '' t) := by simp_rw [Set.symmDiff_def, image_union, image_diff hf] theorem Nonempty.image (f : α → β) {s : Set α} : s.Nonempty → (f '' s).Nonempty \| ⟨x, hx⟩ => ⟨f x, mem_image_of_mem f hx⟩ theorem Nonempty.of_image {f : α → β} {s : Set α} : (f '' s).Nonempty → s.Nonempty \| ⟨_, x, hx, _⟩ => ⟨x, hx⟩ @[simp] theorem image_nonempty {f : α → β} {s : Set α} : (f '' s).Nonempty ↔ s.Nonempty := ⟨Nonempty.of_image, fun h => h.image f⟩ theorem Nonempty.preimage {s : Set β} (hs : s.Nonempty) {f : α → β} (hf : Surjective f) : (f ⁻¹' s).Nonempty := let ⟨y, hy⟩ := hs let ⟨x, hx⟩ := hf y ⟨x, mem_preimage.2 <\| hx.symm ▸ hy⟩ instance (f : α → β) (s : Set α) [Nonempty s] : Nonempty (f '' s) := (Set.Nonempty.image f .of_subtype).to_subtype /-- image and preimage are a Galois connection -/ @[simp] theorem image_subset_iff {s : Set α} {t : Set β} {f : α → β} : f '' s ⊆ t ↔ s ⊆ f ⁻¹' t := forall_mem_image theorem image_preimage_subset (f : α → β) (s : Set β) : f '' (f ⁻¹' s) ⊆ s := image_subset_iff.2 Subset.rfl theorem subset_preimage_image (f : α → β) (s : Set α) : s ⊆ f ⁻¹' (f '' s) := fun _ => mem_image_of_mem f theorem preimage_image_univ {f : α → β} : f ⁻¹' (f '' univ) = univ := Subset.antisymm (fun _ _ => trivial) (subset_preimage_image f univ) @[simp] theorem preimage_image_eq {f : α → β} (s : Set α) (h : Injective f) : f ⁻¹' (f '' s) = s := Subset.antisymm (fun _ ⟨_, hy, e⟩ => h e ▸ hy) (subset_preimage_image f s) @[simp] theorem image_preimage_eq {f : α → β} (s : Set β) (h : Surjective f) : f '' (f ⁻¹' s) = s := Subset.antisymm (image_preimage_subset f s) fun x hx => let ⟨y, e⟩ := h x ⟨y, (e.symm ▸ hx : f y ∈ s), e⟩ @[simp] theorem Nonempty.subset_preimage_const {s : Set α} (hs : Set.Nonempty s) (t : Set β) (a : β) : s ⊆ (fun _ => a) ⁻¹' t ↔ a ∈ t := by rw [← image_subset_iff, hs.image_const, singleton_subset_iff] -- Note defeq abuse identifying `preimage` with function composition in the following two proofs. @[simp] theorem preimage_injective : Injective (preimage f) ↔ Surjective f := injective_comp_right_iff_surjective @[simp] theorem preimage_surjective : Surjective (preimage f) ↔ Injective f := surjective_comp_right_iff_injective @[simp] theorem preimage_eq_preimage {f : β → α} (hf : Surjective f) : f ⁻¹' s = f ⁻¹' t ↔ s = t := (preimage_injective.mpr hf).eq_iff theorem image_inter_preimage (f : α → β) (s : Set α) (t : Set β) : f '' (s ∩ f ⁻¹' t) = f '' s ∩ t := by apply Subset.antisymm · calc f '' (s ∩ f ⁻¹' t) ⊆ f '' s ∩ f '' (f ⁻¹' t) := image_inter_subset _ _ _ _ ⊆ f '' s ∩ t := inter_subset_inter_right _ (image_preimage_subset f t) · rintro _ ⟨⟨x, h', rfl⟩, h⟩ exact ⟨x, ⟨h', h⟩, rfl⟩ theorem image_preimage_inter (f : α → β) (s : Set α) (t : Set β) : f '' (f ⁻¹' t ∩ s) = t ∩ f '' s := by simp only [inter_comm, image_inter_preimage] @[simp] theorem image_inter_nonempty_iff {f : α → β} {s : Set α} {t : Set β} : (f '' s ∩ t).Nonempty ↔ (s ∩ f ⁻¹' t).Nonempty := by rw [← image_inter_preimage, image_nonempty] theorem image_diff_preimage {f : α → β} {s : Set α} {t : Set β} : f '' (s \ f ⁻¹' t) = f '' s \ t := by simp_rw [diff_eq, ← preimage_compl, image_inter_preimage] theorem compl_image : image (compl : Set α → Set α) = preimage compl := image_eq_preimage_of_inverse compl_compl compl_compl theorem compl_image_set_of {p : Set α → Prop} : compl '' { s \| p s } = { s \| p sᶜ } := congr_fun compl_image p theorem inter_preimage_subset (s : Set α) (t : Set β) (f : α → β) : s ∩ f ⁻¹' t ⊆ f ⁻¹' (f '' s ∩ t) := fun _ h => ⟨mem_image_of_mem _ h.left, h.right⟩ theorem union_preimage_subset (s : Set α) (t : Set β) (f : α → β) : s ∪ f ⁻¹' t ⊆ f ⁻¹' (f '' s ∪ t) := fun _ h => Or.elim h (fun l => Or.inl <\| mem_image_of_mem _ l) fun r => Or.inr r theorem subset_image_union (f : α → β) (s : Set α) (t : Set β) : f '' (s ∪ f ⁻¹' t) ⊆ f '' s ∪ t := image_subset_iff.2 (union_preimage_subset _ _ _) theorem preimage_subset_iff {A : Set α} {B : Set β} {f : α → β} : f ⁻¹' B ⊆ A ↔ ∀ a : α, f a ∈ B → a ∈ A := Iff.rfl theorem image_eq_image {f : α → β} (hf : Injective f) : f '' s = f '' t ↔ s = t := Iff.symm <\| (Iff.intro fun eq => eq ▸ rfl) fun eq => by rw [← preimage_image_eq s hf, ← preimage_image_eq t hf, eq] theorem subset_image_iff {t : Set β} : t ⊆ f '' s ↔ ∃ u, u ⊆ s ∧ f '' u = t := by refine ⟨fun h ↦ ⟨f ⁻¹' t ∩ s, inter_subset_right, ?_⟩, fun ⟨u, hu, hu'⟩ ↦ hu'.symm ▸ image_mono hu⟩ rwa [image_preimage_inter, inter_eq_left] @[simp] lemma exists_subset_image_iff {p : Set β → Prop} : (∃ t ⊆ f '' s, p t) ↔ ∃ t ⊆ s, p (f '' t) := by simp [subset_image_iff] @[simp] lemma forall_subset_image_iff {p : Set β → Prop} : (∀ t ⊆ f '' s, p t) ↔ ∀ t ⊆ s, p (f '' t) := by simp [subset_image_iff] theorem image_subset_image_iff {f : α → β} (hf : Injective f) : f '' s ⊆ f '' t ↔ s ⊆ t := by refine Iff.symm <\| (Iff.intro (image_subset f)) fun h => ?_ rw [← preimage_image_eq s hf, ← preimage_image_eq t hf] exact preimage_mono h theorem prod_quotient_preimage_eq_image [s : Setoid α] (g : Quotient s → β) {h : α → β} (Hh : h = g ∘ Quotient.mk'') (r : Set (β × β)) : { x : Quotient s × Quotient s \| (g x.1, g x.2) ∈ r } = (fun a : α × α => (⟦a.1⟧, ⟦a.2⟧)) '' ((fun a : α × α => (h a.1, h a.2)) ⁻¹' r) := Hh.symm ▸ Set.ext fun ⟨a₁, a₂⟩ => ⟨Quot.induction_on₂ a₁ a₂ fun a₁ a₂ h => ⟨(a₁, a₂), h, rfl⟩, fun ⟨⟨b₁, b₂⟩, h₁, h₂⟩ => show (g a₁, g a₂) ∈ r from have h₃ : ⟦b₁⟧ = a₁ ∧ ⟦b₂⟧ = a₂ := Prod.ext_iff.1 h₂ h₃.1 ▸ h₃.2 ▸ h₁⟩ theorem exists_image_iff (f : α → β) (x : Set α) (P : β → Prop) : (∃ a : f '' x, P a) ↔ ∃ a : x, P (f a) := ⟨fun ⟨a, h⟩ => ⟨⟨_, a.prop.choose_spec.1⟩, a.prop.choose_spec.2.symm ▸ h⟩, fun ⟨a, h⟩ => ⟨⟨_, _, a.prop, rfl⟩, h⟩⟩ theorem imageFactorization_eq {f : α → β} {s : Set α} : Subtype.val ∘ imageFactorization f s = f ∘ Subtype.val := funext fun _ => rfl theorem surjective_onto_image {f : α → β} {s : Set α} : Surjective (imageFactorization f s) := fun ⟨_, ⟨a, ha, rfl⟩⟩ => ⟨⟨a, ha⟩, rfl⟩ /-- If the only elements outside `s` are those left fixed by `σ`, then mapping by `σ` has no effect. -/ theorem image_perm {s : Set α} {σ : Equiv.Perm α} (hs : { a : α \| σ a ≠ a } ⊆ s) : σ '' s = s := by ext i obtain hi \| hi := eq_or_ne (σ i) i · refine ⟨?_, fun h => ⟨i, h, hi⟩⟩ rintro ⟨j, hj, h⟩ rwa [σ.injective (hi.trans h.symm)] · refine iff_of_true ⟨σ.symm i, hs fun h => hi ?_, σ.apply_symm_apply _⟩ (hs hi) convert congr_arg σ h <;> exact (σ.apply_symm_apply _).symm end Image /-! ### Lemmas about the powerset and image. -/ /-- The powerset of `{a} ∪ s` is `𝒫 s` together with `{a} ∪ t` for each `t ∈ 𝒫 s`. -/ theorem powerset_insert (s : Set α) (a : α) : 𝒫 insert a s = 𝒫 s ∪ insert a '' 𝒫 s := by ext t simp_rw [mem_union, mem_image, mem_powerset_iff] constructor · intro h by_cases hs : a ∈ t · right refine ⟨t \ {a}, ?_, ?_⟩ · rw [diff_singleton_subset_iff] assumption · rw [insert_diff_singleton, insert_eq_of_mem hs] · left exact (subset_insert_iff_of_not_mem hs).mp h · rintro (h \| ⟨s', h₁, rfl⟩) · exact subset_trans h (subset_insert a s) · exact insert_subset_insert h₁ /-! ### Lemmas about range of a function. -/ section Range variable {f : ι → α} {s t : Set α} theorem forall_mem_range {p : α → Prop} : (∀ a ∈ range f, p a) ↔ ∀ i, p (f i) := by simp theorem forall_subtype_range_iff {p : range f → Prop} : (∀ a : range f, p a) ↔ ∀ i, p ⟨f i, mem_range_self _⟩ := ⟨fun H _ => H _, fun H ⟨y, i, hi⟩ => by subst hi apply H⟩ theorem exists_range_iff {p : α → Prop} : (∃ a ∈ range f, p a) ↔ ∃ i, p (f i) := by simp theorem exists_subtype_range_iff {p : range f → Prop} : (∃ a : range f, p a) ↔ ∃ i, p ⟨f i, mem_range_self _⟩ := ⟨fun ⟨⟨a, i, hi⟩, ha⟩ => by subst a exact ⟨i, ha⟩, fun ⟨_, hi⟩ => ⟨_, hi⟩⟩ theorem range_eq_univ : range f = univ ↔ Surjective f := eq_univ_iff_forall @[deprecated (since := "2024-11-11")] alias range_iff_surjective := range_eq_univ alias ⟨_, _root_.Function.Surjective.range_eq⟩ := range_eq_univ @[simp] theorem subset_range_of_surjective {f : α → β} (h : Surjective f) (s : Set β) : s ⊆ range f := Surjective.range_eq h ▸ subset_univ s @[simp] theorem image_univ {f : α → β} : f '' univ = range f := by ext simp [image, range] lemma image_compl_eq_range_diff_image {f : α → β} (hf : Injective f) (s : Set α) : f '' sᶜ = range f \ f '' s := by rw [← image_univ, ← image_diff hf, compl_eq_univ_diff] /-- Alias of `Set.image_compl_eq_range_sdiff_image`. -/ lemma range_diff_image {f : α → β} (hf : Injective f) (s : Set α) : range f \ f '' s = f '' sᶜ := by rw [image_compl_eq_range_diff_image hf] @[simp] theorem preimage_eq_univ_iff {f : α → β} {s} : f ⁻¹' s = univ ↔ range f ⊆ s := by rw [← univ_subset_iff, ← image_subset_iff, image_univ] theorem image_subset_range (f : α → β) (s) : f '' s ⊆ range f := by rw [← image_univ]; exact image_subset _ (subset_univ _) theorem mem_range_of_mem_image (f : α → β) (s) {x : β} (h : x ∈ f '' s) : x ∈ range f := image_subset_range f s h theorem _root_.Nat.mem_range_succ (i : ℕ) : i ∈ range Nat.succ ↔ 0 < i := ⟨by rintro ⟨n, rfl⟩ exact Nat.succ_pos n, fun h => ⟨_, Nat.succ_pred_eq_of_pos h⟩⟩ theorem Nonempty.preimage' {s : Set β} (hs : s.Nonempty) {f : α → β} (hf : s ⊆ range f) : (f ⁻¹' s).Nonempty := let ⟨_, hy⟩ := hs let ⟨x, hx⟩ := hf hy ⟨x, Set.mem_preimage.2 <\| hx.symm ▸ hy⟩ theorem range_comp (g : α → β) (f : ι → α) : range (g ∘ f) = g '' range f := by aesop /-- Variant of `range_comp` using a lambda instead of function composition. -/ theorem range_comp' (g : α → β) (f : ι → α) : range (fun x => g (f x)) = g '' range f := range_comp g f theorem range_subset_iff : range f ⊆ s ↔ ∀ y, f y ∈ s := forall_mem_range theorem range_subset_range_iff_exists_comp {f : α → γ} {g : β → γ} : range f ⊆ range g ↔ ∃ h : α → β, f = g ∘ h := by simp only [range_subset_iff, mem_range, Classical.skolem, funext_iff, (· ∘ ·), eq_comm] theorem range_eq_iff (f : α → β) (s : Set β) : range f = s ↔ (∀ a, f a ∈ s) ∧ ∀ b ∈ s, ∃ a, f a = b := by rw [← range_subset_iff] exact le_antisymm_iff theorem range_comp_subset_range (f : α → β) (g : β → γ) : range (g ∘ f) ⊆ range g := by rw [range_comp]; apply image_subset_range theorem range_nonempty_iff_nonempty : (range f).Nonempty ↔ Nonempty ι := ⟨fun ⟨_, x, _⟩ => ⟨x⟩, fun ⟨x⟩ => ⟨f x, mem_range_self x⟩⟩ theorem range_nonempty [h : Nonempty ι] (f : ι → α) : (range f).Nonempty := range_nonempty_iff_nonempty.2 h @[simp] theorem range_eq_empty_iff {f : ι → α} : range f = ∅ ↔ IsEmpty ι := by rw [← not_nonempty_iff, ← range_nonempty_iff_nonempty, not_nonempty_iff_eq_empty] theorem range_eq_empty [IsEmpty ι] (f : ι → α) : range f = ∅ := range_eq_empty_iff.2 ‹_› instance instNonemptyRange [Nonempty ι] (f : ι → α) : Nonempty (range f) := (range_nonempty f).to_subtype @[simp] theorem image_union_image_compl_eq_range (f : α → β) : f '' s ∪ f '' sᶜ = range f := by rw [← image_union, ← image_univ, ← union_compl_self] theorem insert_image_compl_eq_range (f : α → β) (x : α) : insert (f x) (f '' {x}ᶜ) = range f := by rw [← image_insert_eq, insert_eq, union_compl_self, image_univ] theorem image_preimage_eq_range_inter {f : α → β} {t : Set β} : f '' (f ⁻¹' t) = range f ∩ t := ext fun x => ⟨fun ⟨_, hx, HEq⟩ => HEq ▸ ⟨mem_range_self _, hx⟩, fun ⟨⟨y, h_eq⟩, hx⟩ => h_eq ▸ mem_image_of_mem f <\| show y ∈ f ⁻¹' t by rw [preimage, mem_setOf, h_eq]; exact hx⟩ theorem image_preimage_eq_inter_range {f : α → β} {t : Set β} : f '' (f ⁻¹' t) = t ∩ range f := by rw [image_preimage_eq_range_inter, inter_comm] theorem image_preimage_eq_of_subset {f : α → β} {s : Set β} (hs : s ⊆ range f) : f '' (f ⁻¹' s) = s := by rw [image_preimage_eq_range_inter, inter_eq_self_of_subset_right hs] theorem image_preimage_eq_iff {f : α → β} {s : Set β} : f '' (f ⁻¹' s) = s ↔ s ⊆ range f := ⟨by intro h rw [← h] apply image_subset_range, image_preimage_eq_of_subset⟩ theorem subset_range_iff_exists_image_eq {f : α → β} {s : Set β} : s ⊆ range f ↔ ∃ t, f '' t = s := ⟨fun h => ⟨_, image_preimage_eq_iff.2 h⟩, fun ⟨_, ht⟩ => ht ▸ image_subset_range _ _⟩ theorem range_image (f : α → β) : range (image f) = 𝒫 range f := ext fun _ => subset_range_iff_exists_image_eq.symm @[simp] theorem exists_subset_range_and_iff {f : α → β} {p : Set β → Prop} : (∃ s, s ⊆ range f ∧ p s) ↔ ∃ s, p (f '' s) := by rw [← exists_range_iff, range_image]; rfl @[simp] theorem forall_subset_range_iff {f : α → β} {p : Set β → Prop} : (∀ s, s ⊆ range f → p s) ↔ ∀ s, p (f '' s) := by rw [← forall_mem_range, range_image]; simp only [mem_powerset_iff] @[simp] theorem preimage_subset_preimage_iff {s t : Set α} {f : β → α} (hs : s ⊆ range f) : f ⁻¹' s ⊆ f ⁻¹' t ↔ s ⊆ t := by constructor · intro h x hx rcases hs hx with ⟨y, rfl⟩ exact h hx intro h x; apply h theorem preimage_eq_preimage' {s t : Set α} {f : β → α} (hs : s ⊆ range f) (ht : t ⊆ range f) : f ⁻¹' s = f ⁻¹' t ↔ s = t := by constructor · intro h apply Subset.antisymm · rw [← preimage_subset_preimage_iff hs, h] · rw [← preimage_subset_preimage_iff ht, h] rintro rfl; rfl -- Not `@[simp]` since `simp` can prove this. theorem preimage_inter_range {f : α → β} {s : Set β} : f ⁻¹' (s ∩ range f) = f ⁻¹' s := Set.ext fun x => and_iff_left ⟨x, rfl⟩ -- Not `@[simp]` since `simp` can prove this. theorem preimage_range_inter {f : α → β} {s : Set β} : f ⁻¹' (range f ∩ s) = f ⁻¹' s := by rw [inter_comm, preimage_inter_range] theorem preimage_image_preimage {f : α → β} {s : Set β} : f ⁻¹' (f '' (f ⁻¹' s)) = f ⁻¹' s := by rw [image_preimage_eq_range_inter, preimage_range_inter] @[simp, mfld_simps] theorem range_id : range (@id α) = univ := range_eq_univ.2 surjective_id @[simp, mfld_simps] theorem range_id' : (range fun x : α => x) = univ := range_id @[simp] theorem _root_.Prod.range_fst [Nonempty β] : range (Prod.fst : α × β → α) = univ := Prod.fst_surjective.range_eq @[simp] theorem _root_.Prod.range_snd [Nonempty α] : range (Prod.snd : α × β → β) = univ := Prod.snd_surjective.range_eq @[simp] theorem range_eval {α : ι → Sort _} [∀ i, Nonempty (α i)] (i : ι) : range (eval i : (∀ i, α i) → α i) = univ := (surjective_eval i).range_eq theorem range_inl : range (@Sum.inl α β) = {x \| Sum.isLeft x} := by ext (_\|_) <;> simp theorem range_inr : range (@Sum.inr α β) = {x \| Sum.isRight x} := by ext (_\|_) <;> simp theorem isCompl_range_inl_range_inr : IsCompl (range <\| @Sum.inl α β) (range Sum.inr) := IsCompl.of_le (by rintro y ⟨⟨x₁, rfl⟩, ⟨x₂, h⟩⟩ exact Sum.noConfusion h) (by rintro (x \| y) - <;> [left; right] <;> exact mem_range_self _) @[simp] theorem range_inl_union_range_inr : range (Sum.inl : α → α ⊕ β) ∪ range Sum.inr = univ := isCompl_range_inl_range_inr.sup_eq_top @[simp] theorem range_inl_inter_range_inr : range (Sum.inl : α → α ⊕ β) ∩ range Sum.inr = ∅ := isCompl_range_inl_range_inr.inf_eq_bot @[simp] theorem range_inr_union_range_inl : range (Sum.inr : β → α ⊕ β) ∪ range Sum.inl = univ := isCompl_range_inl_range_inr.symm.sup_eq_top @[simp] theorem range_inr_inter_range_inl : range (Sum.inr : β → α ⊕ β) ∩ range Sum.inl = ∅ := isCompl_range_inl_range_inr.symm.inf_eq_bot @[simp] theorem preimage_inl_image_inr (s : Set β) : Sum.inl ⁻¹' (@Sum.inr α β '' s) = ∅ := by ext simp @[simp] theorem preimage_inr_image_inl (s : Set α) : Sum.inr ⁻¹' (@Sum.inl α β '' s) = ∅ := by ext simp @[simp] theorem preimage_inl_range_inr : Sum.inl ⁻¹' range (Sum.inr : β → α ⊕ β) = ∅ := by rw [← image_univ, preimage_inl_image_inr] @[simp] theorem preimage_inr_range_inl : Sum.inr ⁻¹' range (Sum.inl : α → α ⊕ β) = ∅ := by rw [← image_univ, preimage_inr_image_inl] @[simp] theorem compl_range_inl : (range (Sum.inl : α → α ⊕ β))ᶜ = range (Sum.inr : β → α ⊕ β) := IsCompl.compl_eq isCompl_range_inl_range_inr @[simp] theorem compl_range_inr : (range (Sum.inr : β → α ⊕ β))ᶜ = range (Sum.inl : α → α ⊕ β) := IsCompl.compl_eq isCompl_range_inl_range_inr.symm theorem image_preimage_inl_union_image_preimage_inr (s : Set (α ⊕ β)) : Sum.inl '' (Sum.inl ⁻¹' s) ∪ Sum.inr '' (Sum.inr ⁻¹' s) = s := by rw [image_preimage_eq_inter_range, image_preimage_eq_inter_range, ← inter_union_distrib_left, range_inl_union_range_inr, inter_univ] @[simp] theorem range_quot_mk (r : α → α → Prop) : range (Quot.mk r) = univ := Quot.mk_surjective.range_eq @[simp] theorem range_quot_lift {r : ι → ι → Prop} (hf : ∀ x y, r x y → f x = f y) : range (Quot.lift f hf) = range f := ext fun _ => Quot.mk_surjective.exists @[simp] theorem range_quotient_mk {s : Setoid α} : range (Quotient.mk s) = univ := range_quot_mk _ @[simp] theorem range_quotient_lift [s : Setoid ι] (hf) : range (Quotient.lift f hf : Quotient s → α) = range f := range_quot_lift _ @[simp] theorem range_quotient_mk' {s : Setoid α} : range (Quotient.mk' : α → Quotient s) = univ := range_quot_mk _ lemma Quotient.range_mk'' {sa : Setoid α} : range (Quotient.mk'' (s₁ := sa)) = univ := range_quotient_mk @[simp] theorem range_quotient_lift_on' {s : Setoid ι} (hf) : (range fun x : Quotient s => Quotient.liftOn' x f hf) = range f := range_quot_lift _ instance canLift (c) (p) [CanLift α β c p] : CanLift (Set α) (Set β) (c '' ·) fun s => ∀ x ∈ s, p x where prf _ hs := subset_range_iff_exists_image_eq.mp fun x hx => CanLift.prf _ (hs x hx) theorem range_const_subset {c : α} : (range fun _ : ι => c) ⊆ {c} := range_subset_iff.2 fun _ => rfl @[simp] theorem range_const : ∀ [Nonempty ι] {c : α}, (range fun _ : ι => c) = {c} \| ⟨x⟩, _ => (Subset.antisymm range_const_subset) fun _ hy => (mem_singleton_iff.1 hy).symm ▸ mem_range_self x theorem range_subtype_map {p : α → Prop} {q : β → Prop} (f : α → β) (h : ∀ x, p x → q (f x)) : range (Subtype.map f h) = (↑) ⁻¹' (f '' { x \| p x }) := by ext ⟨x, hx⟩ simp_rw [mem_preimage, mem_range, mem_image, Subtype.exists, Subtype.map] simp only [Subtype.mk.injEq, exists_prop, mem_setOf_eq] theorem image_swap_eq_preimage_swap : image (@Prod.swap α β) = preimage Prod.swap := image_eq_preimage_of_inverse Prod.swap_leftInverse Prod.swap_rightInverse theorem preimage_singleton_nonempty {f : α → β} {y : β} : (f ⁻¹' {y}).Nonempty ↔ y ∈ range f := Iff.rfl theorem preimage_singleton_eq_empty {f : α → β} {y : β} : f ⁻¹' {y} = ∅ ↔ y ∉ range f := not_nonempty_iff_eq_empty.symm.trans preimage_singleton_nonempty.not theorem range_subset_singleton {f : ι → α} {x : α} : range f ⊆ {x} ↔ f = const ι x := by simp [range_subset_iff, funext_iff, mem_singleton] theorem image_compl_preimage {f : α → β} {s : Set β} : f '' (f ⁻¹' s)ᶜ = range f \ s := by rw [compl_eq_univ_diff, image_diff_preimage, image_univ] theorem rangeFactorization_eq {f : ι → β} : Subtype.val ∘ rangeFactorization f = f := funext fun _ => rfl @[simp] theorem rangeFactorization_coe (f : ι → β) (a : ι) : (rangeFactorization f a : β) = f a := rfl @[simp] theorem coe_comp_rangeFactorization (f : ι → β) : (↑) ∘ rangeFactorization f = f := rfl theorem surjective_onto_range : Surjective (rangeFactorization f) := fun ⟨_, ⟨i, rfl⟩⟩ => ⟨i, rfl⟩ theorem image_eq_range (f : α → β) (s : Set α) : f '' s = range fun x : s => f x := by ext constructor · rintro ⟨x, h1, h2⟩ exact ⟨⟨x, h1⟩, h2⟩ · rintro ⟨⟨x, h1⟩, h2⟩ exact ⟨x, h1, h2⟩ theorem _root_.Sum.range_eq (f : α ⊕ β → γ) : range f = range (f ∘ Sum.inl) ∪ range (f ∘ Sum.inr) := ext fun _ => Sum.exists @[simp] theorem Sum.elim_range (f : α → γ) (g : β → γ) : range (Sum.elim f g) = range f ∪ range g := Sum.range_eq _ theorem range_ite_subset' {p : Prop} [Decidable p] {f g : α → β} : range (if p then f else g) ⊆ range f ∪ range g := by by_cases h : p · rw [if_pos h] exact subset_union_left · rw [if_neg h] exact subset_union_right theorem range_ite_subset {p : α → Prop} [DecidablePred p] {f g : α → β} : (range fun x => if p x then f x else g x) ⊆ range f ∪ range g := by rw [range_subset_iff]; intro x; by_cases h : p x · simp only [if_pos h, mem_union, mem_range, exists_apply_eq_apply, true_or] · simp [if_neg h, mem_union, mem_range_self] @[simp] theorem preimage_range (f : α → β) : f ⁻¹' range f = univ := eq_univ_of_forall mem_range_self /-- The range of a function from a `Unique` type contains just the function applied to its single value. -/ theorem range_unique [h : Unique ι] : range f = {f default} := by ext x rw [mem_range] constructor · rintro ⟨i, hi⟩ rw [h.uniq i] at hi exact hi ▸ mem_singleton _ · exact fun h => ⟨default, h.symm⟩ theorem range_diff_image_subset (f : α → β) (s : Set α) : range f \ f '' s ⊆ f '' sᶜ := fun _ ⟨⟨x, h₁⟩, h₂⟩ => ⟨x, fun h => h₂ ⟨x, h, h₁⟩, h₁⟩ @[simp] theorem range_inclusion (h : s ⊆ t) : range (inclusion h) = { x : t \| (x : α) ∈ s } := by ext ⟨x, hx⟩ simp -- When `f` is injective, see also `Equiv.ofInjective`. theorem leftInverse_rangeSplitting (f : α → β) : LeftInverse (rangeFactorization f) (rangeSplitting f) := fun x => by ext simp only [rangeFactorization_coe] apply apply_rangeSplitting theorem rangeSplitting_injective (f : α → β) : Injective (rangeSplitting f) := (leftInverse_rangeSplitting f).injective theorem rightInverse_rangeSplitting {f : α → β} (h : Injective f) : RightInverse (rangeFactorization f) (rangeSplitting f) := (leftInverse_rangeSplitting f).rightInverse_of_injective fun _ _ hxy => h <\| Subtype.ext_iff.1 hxy theorem preimage_rangeSplitting {f : α → β} (hf : Injective f) : preimage (rangeSplitting f) = image (rangeFactorization f) := (image_eq_preimage_of_inverse (rightInverse_rangeSplitting hf) (leftInverse_rangeSplitting f)).symm theorem isCompl_range_some_none (α : Type) : IsCompl (range (some : α → Option α)) {none} := IsCompl.of_le (fun _ ⟨⟨_, ha⟩, (hn : _ = none)⟩ => Option.some_ne_none _ (ha.trans hn)) fun x _ => Option.casesOn x (Or.inr rfl) fun _ => Or.inl <\| mem_range_self _ @[simp] theorem compl_range_some (α : Type) : (range (some : α → Option α))ᶜ = {none} := (isCompl_range_some_none α).compl_eq @[simp] theorem range_some_inter_none (α : Type) : range (some : α → Option α) ∩ {none} = ∅ := (isCompl_range_some_none α).inf_eq_bot -- Not `@[simp]` since `simp` can prove this. theorem range_some_union_none (α : Type) : range (some : α → Option α) ∪ {none} = univ := (isCompl_range_some_none α).sup_eq_top @[simp] theorem insert_none_range_some (α : Type) : insert none (range (some : α → Option α)) = univ := (isCompl_range_some_none α).symm.sup_eq_top lemma image_of_range_union_range_eq_univ {α β γ γ' δ δ' : Type} {h : β → α} {f : γ → β} {f₁ : γ' → α} {f₂ : γ → γ'} {g : δ → β} {g₁ : δ' → α} {g₂ : δ → δ'} (hf : h ∘ f = f₁ ∘ f₂) (hg : h ∘ g = g₁ ∘ g₂) (hfg : range f ∪ range g = univ) (s : Set β) : h '' s = f₁ '' (f₂ '' (f ⁻¹' s)) ∪ g₁ '' (g₂ '' (g ⁻¹' s)) := by rw [← image_comp, ← image_comp, ← hf, ← hg, image_comp, image_comp, image_preimage_eq_inter_range, image_preimage_eq_inter_range, ← image_union, ← inter_union_distrib_left, hfg, inter_univ] end Range section Subsingleton variable {s : Set α} {f : α → β} /-- The image of a subsingleton is a subsingleton. -/ theorem Subsingleton.image (hs : s.Subsingleton) (f : α → β) : (f '' s).Subsingleton := fun _ ⟨_, hx, Hx⟩ _ ⟨_, hy, Hy⟩ => Hx ▸ Hy ▸ congr_arg f (hs hx hy) /-- The preimage of a subsingleton under an injective map is a subsingleton. -/ theorem Subsingleton.preimage {s : Set β} (hs : s.Subsingleton) (hf : Function.Injective f) : (f ⁻¹' s).Subsingleton := fun _ ha _ hb => hf <\| hs ha hb /-- If the image of a set under an injective map is a subsingleton, the set is a subsingleton. -/ theorem subsingleton_of_image (hf : Function.Injective f) (s : Set α) (hs : (f '' s).Subsingleton) : s.Subsingleton := (hs.preimage hf).anti <\| subset_preimage_image _ _ /-- If the preimage of a set under a surjective map is a subsingleton, the set is a subsingleton. -/ theorem subsingleton_of_preimage (hf : Function.Surjective f) (s : Set β) (hs : (f ⁻¹' s).Subsingleton) : s.Subsingleton := fun fx hx fy hy => by rcases hf fx, hf fy with ⟨⟨x, rfl⟩, ⟨y, rfl⟩⟩ exact congr_arg f (hs hx hy) theorem subsingleton_range {α : Sort} [Subsingleton α] (f : α → β) : (range f).Subsingleton := forall_mem_range.2 fun x => forall_mem_range.2 fun y => congr_arg f (Subsingleton.elim x y) /-- The preimage of a nontrivial set under a surjective map is nontrivial. -/ theorem Nontrivial.preimage {s : Set β} (hs : s.Nontrivial) (hf : Function.Surjective f) : (f ⁻¹' s).Nontrivial := by rcases hs with ⟨fx, hx, fy, hy, hxy⟩ rcases hf fx, hf fy with ⟨⟨x, rfl⟩, ⟨y, rfl⟩⟩ exact ⟨x, hx, y, hy, mt (congr_arg f) hxy⟩ /-- The image of a nontrivial set under an injective map is nontrivial. -/ theorem Nontrivial.image (hs : s.Nontrivial) (hf : Function.Injective f) : (f '' s).Nontrivial := let ⟨x, hx, y, hy, hxy⟩ := hs ⟨f x, mem_image_of_mem f hx, f y, mem_image_of_mem f hy, hf.ne hxy⟩ theorem Nontrivial.image_of_injOn (hs : s.Nontrivial) (hf : s.InjOn f) : (f '' s).Nontrivial := by obtain ⟨x, hx, y, hy, hxy⟩ := hs exact ⟨f x, mem_image_of_mem _ hx, f y, mem_image_of_mem _ hy, (hxy <\| hf hx hy ·)⟩ /-- If the image of a set is nontrivial, the set is nontrivial. -/ theorem nontrivial_of_image (f : α → β) (s : Set α) (hs : (f '' s).Nontrivial) : s.Nontrivial := let ⟨_, ⟨x, hx, rfl⟩, _, ⟨y, hy, rfl⟩, hxy⟩ := hs ⟨x, hx, y, hy, mt (congr_arg f) hxy⟩ @[simp] theorem image_nontrivial (hf : f.Injective) : (f '' s).Nontrivial ↔ s.Nontrivial := ⟨nontrivial_of_image f s, fun h ↦ h.image hf⟩ @[simp] theorem InjOn.image_nontrivial_iff (hf : s.InjOn f) : (f '' s).Nontrivial ↔ s.Nontrivial := ⟨nontrivial_of_image f s, fun h ↦ h.image_of_injOn hf⟩ /-- If the preimage of a set under an injective map is nontrivial, the set is nontrivial. -/ theorem nontrivial_of_preimage (hf : Function.Injective f) (s : Set β) (hs : (f ⁻¹' s).Nontrivial) : s.Nontrivial := (hs.image hf).mono <\| image_preimage_subset _ _ end Subsingleton end Set namespace Function variable {α β : Type} {ι : Sort} {f : α → β} open Set theorem Surjective.preimage_injective (hf : Surjective f) : Injective (preimage f) := fun _ _ => (preimage_eq_preimage hf).1 theorem Injective.preimage_image (hf : Injective f) (s : Set α) : f ⁻¹' (f '' s) = s := preimage_image_eq s hf theorem Injective.preimage_surjective (hf : Injective f) : Surjective (preimage f) := Set.preimage_surjective.mpr hf theorem Injective.subsingleton_image_iff (hf : Injective f) {s : Set α} : (f '' s).Subsingleton ↔ s.Subsingleton := ⟨subsingleton_of_image hf s, fun h => h.image f⟩ theorem Surjective.image_preimage (hf : Surjective f) (s : Set β) : f '' (f ⁻¹' s) = s := image_preimage_eq s hf theorem Surjective.image_surjective (hf : Surjective f) : Surjective (image f) := by intro s use f ⁻¹' s rw [hf.image_preimage] @[simp] theorem Surjective.nonempty_preimage (hf : Surjective f) {s : Set β} : (f ⁻¹' s).Nonempty ↔ s.Nonempty := by rw [← image_nonempty, hf.image_preimage] theorem Injective.image_injective (hf : Injective f) : Injective (image f) := by intro s t h rw [← preimage_image_eq s hf, ← preimage_image_eq t hf, h] lemma Injective.image_strictMono (inj : Function.Injective f) : StrictMono (image f) := monotone_image.strictMono_of_injective inj.image_injective theorem Surjective.preimage_subset_preimage_iff {s t : Set β} (hf : Surjective f) : f ⁻¹' s ⊆ f ⁻¹' t ↔ s ⊆ t := by apply Set.preimage_subset_preimage_iff rw [hf.range_eq] apply subset_univ theorem Surjective.range_comp {ι' : Sort} {f : ι → ι'} (hf : Surjective f) (g : ι' → α) : range (g ∘ f) = range g := ext fun y => (@Surjective.exists _ _ _ hf fun x => g x = y).symm theorem Injective.mem_range_iff_existsUnique (hf : Injective f) {b : β} : b ∈ range f ↔ ∃! a, f a = b := ⟨fun ⟨a, h⟩ => ⟨a, h, fun _ ha => hf (ha.trans h.symm)⟩, ExistsUnique.exists⟩ alias ⟨Injective.existsUnique_of_mem_range, _⟩ := Injective.mem_range_iff_existsUnique theorem Injective.compl_image_eq (hf : Injective f) (s : Set α) : (f '' s)ᶜ = f '' sᶜ ∪ (range f)ᶜ := by ext y rcases em (y ∈ range f) with (⟨x, rfl⟩ \| hx) · simp [hf.eq_iff] · rw [mem_range, not_exists] at hx simp [hx] theorem LeftInverse.image_image {g : β → α} (h : LeftInverse g f) (s : Set α) : g '' (f '' s) = s := by rw [← image_comp, h.comp_eq_id, image_id] theorem LeftInverse.preimage_preimage {g : β → α} (h : LeftInverse g f) (s : Set α) : f ⁻¹' (g ⁻¹' s) = s := by rw [← preimage_comp, h.comp_eq_id, preimage_id] protected theorem Involutive.preimage {f : α → α} (hf : Involutive f) : Involutive (preimage f) := hf.rightInverse.preimage_preimage end Function namespace EquivLike variable {ι ι' : Sort} {E : Type} [EquivLike E ι ι'] @[simp] lemma range_comp {α : Type} (f : ι' → α) (e : E) : range (f ∘ e) = range f := (EquivLike.surjective _).range_comp _ end EquivLike /-! ### Image and preimage on subtypes -/ namespace Subtype variable {α : Type} theorem coe_image {p : α → Prop} {s : Set (Subtype p)} : (↑) '' s = { x \| ∃ h : p x, (⟨x, h⟩ : Subtype p) ∈ s } := Set.ext fun a => ⟨fun ⟨⟨_, ha'⟩, in_s, h_eq⟩ => h_eq ▸ ⟨ha', in_s⟩, fun ⟨ha, in_s⟩ => ⟨⟨a, ha⟩, in_s, rfl⟩⟩ @[simp] theorem coe_image_of_subset {s t : Set α} (h : t ⊆ s) : (↑) '' { x : ↥s \| ↑x ∈ t } = t := by ext x rw [mem_image] exact ⟨fun ⟨_, hx', hx⟩ => hx ▸ hx', fun hx => ⟨⟨x, h hx⟩, hx, rfl⟩⟩ theorem range_coe {s : Set α} : range ((↑) : s → α) = s := by rw [← image_univ] simp [-image_univ, coe_image] /-- A variant of `range_coe`. Try to use `range_coe` if possible. This version is useful when defining a new type that is defined as the subtype of something. In that case, the coercion doesn't fire anymore. -/ theorem range_val {s : Set α} : range (Subtype.val : s → α) = s := range_coe /-- We make this the simp lemma instead of `range_coe`. The reason is that if we write for `s : Set α` the function `(↑) : s → α`, then the inferred implicit arguments of `(↑)` are `↑α (fun x ↦ x ∈ s)`. -/ @[simp] theorem range_coe_subtype {p : α → Prop} : range ((↑) : Subtype p → α) = { x \| p x } := range_coe @[simp] theorem coe_preimage_self (s : Set α) : ((↑) : s → α) ⁻¹' s = univ := by rw [← preimage_range, range_coe] theorem range_val_subtype {p : α → Prop} : range (Subtype.val : Subtype p → α) = { x \| p x } := range_coe theorem coe_image_subset (s : Set α) (t : Set s) : ((↑) : s → α) '' t ⊆ s := fun x ⟨y, _, yvaleq⟩ => by rw [← yvaleq]; exact y.property theorem coe_image_univ (s : Set α) : ((↑) : s → α) '' Set.univ = s := image_univ.trans range_coe @[simp] theorem image_preimage_coe (s t : Set α) : ((↑) : s → α) '' (((↑) : s → α) ⁻¹' t) = s ∩ t := image_preimage_eq_range_inter.trans <\| congr_arg (· ∩ t) range_coe theorem image_preimage_val (s t : Set α) : (Subtype.val : s → α) '' (Subtype.val ⁻¹' t) = s ∩ t := image_preimage_coe s t theorem preimage_coe_eq_preimage_coe_iff {s t u : Set α} : ((↑) : s → α) ⁻¹' t = ((↑) : s → α) ⁻¹' u ↔ s ∩ t = s ∩ u := by rw [← image_preimage_coe, ← image_preimage_coe, coe_injective.image_injective.eq_iff] theorem preimage_coe_self_inter (s t : Set α) : ((↑) : s → α) ⁻¹' (s ∩ t) = ((↑) : s → α) ⁻¹' t := by rw [preimage_coe_eq_preimage_coe_iff, ← inter_assoc, inter_self] -- Not `@[simp]` since `simp` can prove this. theorem preimage_coe_inter_self (s t : Set α) : ((↑) : s → α) ⁻¹' (t ∩ s) = ((↑) : s → α) ⁻¹' t := by rw [inter_comm, preimage_coe_self_inter] theorem preimage_val_eq_preimage_val_iff (s t u : Set α) : (Subtype.val : s → α) ⁻¹' t = Subtype.val ⁻¹' u ↔ s ∩ t = s ∩ u := preimage_coe_eq_preimage_coe_iff lemma preimage_val_subset_preimage_val_iff (s t u : Set α) : (Subtype.val ⁻¹' t : Set s) ⊆ Subtype.val ⁻¹' u ↔ s ∩ t ⊆ s ∩ u := by constructor · rw [← image_preimage_coe, ← image_preimage_coe] exact image_subset _ · intro h x a exact (h ⟨x.2, a⟩).2 theorem exists_set_subtype {t : Set α} (p : Set α → Prop) : (∃ s : Set t, p (((↑) : t → α) '' s)) ↔ ∃ s : Set α, s ⊆ t ∧ p s := by rw [← exists_subset_range_and_iff, range_coe] theorem forall_set_subtype {t : Set α} (p : Set α → Prop) : (∀ s : Set t, p (((↑) : t → α) '' s)) ↔ ∀ s : Set α, s ⊆ t → p s := by rw [← forall_subset_range_iff, range_coe] theorem preimage_coe_nonempty {s t : Set α} : (((↑) : s → α) ⁻¹' t).Nonempty ↔ (s ∩ t).Nonempty := by rw [← image_preimage_coe, image_nonempty] theorem preimage_coe_eq_empty {s t : Set α} : ((↑) : s → α) ⁻¹' t = ∅ ↔ s ∩ t = ∅ := by simp [← not_nonempty_iff_eq_empty, preimage_coe_nonempty] -- Not `@[simp]` since `simp` can prove this. theorem preimage_coe_compl (s : Set α) : ((↑) : s → α) ⁻¹' sᶜ = ∅ := preimage_coe_eq_empty.2 (inter_compl_self s) @[simp] theorem preimage_coe_compl' (s : Set α) : (fun x : (sᶜ : Set α) => (x : α)) ⁻¹' s = ∅ := preimage_coe_eq_empty.2 (compl_inter_self s) end Subtype /-! ### Images and preimages on `Option` -/ open Set namespace Option theorem injective_iff {α β} {f : Option α → β} : Injective f ↔ Injective (f ∘ some) ∧ f none ∉ range (f ∘ some) := by simp only [mem_range, not_exists, (· ∘ ·)] refine ⟨fun hf => ⟨hf.comp (Option.some_injective _), fun x => hf.ne <\| Option.some_ne_none _⟩, ?_⟩ rintro ⟨h_some, h_none⟩ (_ \| a) (_ \| b) hab exacts [rfl, (h_none _ hab.symm).elim, (h_none _ hab).elim, congr_arg some (h_some hab)] theorem range_eq {α β} (f : Option α → β) : range f = insert (f none) (range (f ∘ some)) := Set.ext fun _ => Option.exists.trans <\| eq_comm.or Iff.rfl end Option namespace Set open Function /-! ### Injectivity and surjectivity lemmas for image and preimage -/ section ImagePreimage variable {α : Type u} {β : Type v} {f : α → β} @[simp] theorem image_surjective : Surjective (image f) ↔ Surjective f := by refine ⟨fun h y => ?_, Surjective.image_surjective⟩ rcases h {y} with ⟨s, hs⟩ have := mem_singleton y; rw [← hs] at this; rcases this with ⟨x, _, hx⟩ exact ⟨x, hx⟩ @[simp] theorem image_injective : Injective (image f) ↔ Injective f := by refine ⟨fun h x x' hx => ?_, Injective.image_injective⟩ rw [← singleton_eq_singleton_iff]; apply h rw [image_singleton, image_singleton, hx] theorem preimage_eq_iff_eq_image {f : α → β} (hf : Bijective f) {s t} : f ⁻¹' s = t ↔ s = f '' t := by rw [← image_eq_image hf.1, hf.2.image_preimage] theorem eq_preimage_iff_image_eq {f : α → β} (hf : Bijective f) {s t} : s = f ⁻¹' t ↔ f '' s = t := by rw [← image_eq_image hf.1, hf.2.image_preimage] end ImagePreimage end Set /-! ### Disjoint lemmas for image and preimage -/ section Disjoint variable {α β γ : Type*} {f : α → β} {s t : Set α} theorem Disjoint.preimage (f : α → β) {s t : Set β} (h : Disjoint s t) : Disjoint (f ⁻¹' s) (f ⁻¹' t) := disjoint_iff_inf_le.mpr fun _ hx => h.le_bot hx	lemma Codisjoint.preimage (f : α → β) {s t : Set β} (h : Codisjoint s t) : Codisjoint (f ⁻¹' s) (f ⁻¹' t) := by simp only [codisjoint_iff_le_sup, Set.sup_eq_union, top_le_iff, ← Set.preimage_union] at h ⊢ rw [h]; rfl lemma IsCompl.preimage (f : α → β) {s t : Set β} (h : IsCompl s t) :	Mathlib/Data/Set/Image.lean	1,320	1,326
/- Copyright (c) 2020 Thomas Browning. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Thomas Browning -/ import Mathlib.Algebra.BigOperators.NatAntidiagonal import Mathlib.Algebra.Polynomial.Reverse /-! # "Mirror" of a univariate polynomial In this file we define `Polynomial.mirror`, a variant of `Polynomial.reverse`. The difference between `reverse` and `mirror` is that `reverse` will decrease the degree if the polynomial is divisible by `X`. ## Main definitions - `Polynomial.mirror` ## Main results - `Polynomial.mirror_mul_of_domain`: `mirror` preserves multiplication. - `Polynomial.irreducible_of_mirror`: an irreducibility criterion involving `mirror` -/ namespace Polynomial section Semiring variable {R : Type} [Semiring R] (p q : R[X]) /-- mirror of a polynomial: reverses the coefficients while preserving `Polynomial.natDegree` -/ noncomputable def mirror := p.reverse X ^ p.natTrailingDegree @[simp] theorem mirror_zero : (0 : R[X]).mirror = 0 := by simp [mirror] theorem mirror_monomial (n : ℕ) (a : R) : (monomial n a).mirror = monomial n a := by classical by_cases ha : a = 0 · rw [ha, monomial_zero_right, mirror_zero] · rw [mirror, reverse, natDegree_monomial n a, if_neg ha, natTrailingDegree_monomial ha, ← C_mul_X_pow_eq_monomial, reflect_C_mul_X_pow, revAt_le (le_refl n), tsub_self, pow_zero, mul_one] theorem mirror_C (a : R) : (C a).mirror = C a := mirror_monomial 0 a theorem mirror_X : X.mirror = (X : R[X]) := mirror_monomial 1 (1 : R) theorem mirror_natDegree : p.mirror.natDegree = p.natDegree := by by_cases hp : p = 0 · rw [hp, mirror_zero] nontriviality R rw [mirror, natDegree_mul', reverse_natDegree, natDegree_X_pow, tsub_add_cancel_of_le p.natTrailingDegree_le_natDegree] rwa [leadingCoeff_X_pow, mul_one, reverse_leadingCoeff, Ne, trailingCoeff_eq_zero] theorem mirror_natTrailingDegree : p.mirror.natTrailingDegree = p.natTrailingDegree := by by_cases hp : p = 0 · rw [hp, mirror_zero] · rw [mirror, natTrailingDegree_mul_X_pow ((mt reverse_eq_zero.mp) hp), natTrailingDegree_reverse, zero_add] theorem coeff_mirror (n : ℕ) : p.mirror.coeff n = p.coeff (revAt (p.natDegree + p.natTrailingDegree) n) := by by_cases h2 : p.natDegree < n · rw [coeff_eq_zero_of_natDegree_lt (by rwa [mirror_natDegree])] by_cases h1 : n ≤ p.natDegree + p.natTrailingDegree · rw [revAt_le h1, coeff_eq_zero_of_lt_natTrailingDegree] exact (tsub_lt_iff_left h1).mpr (Nat.add_lt_add_right h2 _) · rw [← revAtFun_eq, revAtFun, if_neg h1, coeff_eq_zero_of_natDegree_lt h2] rw [not_lt] at h2 rw [revAt_le (h2.trans (Nat.le_add_right _ _))] by_cases h3 : p.natTrailingDegree ≤ n · rw [← tsub_add_eq_add_tsub h2, ← tsub_tsub_assoc h2 h3, mirror, coeff_mul_X_pow', if_pos h3, coeff_reverse, revAt_le (tsub_le_self.trans h2)] rw [not_le] at h3 rw [coeff_eq_zero_of_natDegree_lt (lt_tsub_iff_right.mpr (Nat.add_lt_add_left h3 _))] exact coeff_eq_zero_of_lt_natTrailingDegree (by rwa [mirror_natTrailingDegree]) --TODO: Extract `Finset.sum_range_rev_at` lemma. theorem mirror_eval_one : p.mirror.eval 1 = p.eval 1 := by simp_rw [eval_eq_sum_range, one_pow, mul_one, mirror_natDegree] refine Finset.sum_bij_ne_zero ?_ ?_ ?_ ?_ ?_ · exact fun n _ _ => revAt (p.natDegree + p.natTrailingDegree) n · intro n hn hp rw [Finset.mem_range_succ_iff] at * rw [revAt_le (hn.trans (Nat.le_add_right _ _))] rw [tsub_le_iff_tsub_le, add_comm, add_tsub_cancel_right, ← mirror_natTrailingDegree] exact natTrailingDegree_le_of_ne_zero hp · exact fun n₁ _ _ _ _ _ h => by rw [← @revAt_invol _ n₁, h, revAt_invol] · intro n hn hp use revAt (p.natDegree + p.natTrailingDegree) n refine ⟨?_, ?_, revAt_invol⟩ · rw [Finset.mem_range_succ_iff] at * rw [revAt_le (hn.trans (Nat.le_add_right _ _))] rw [tsub_le_iff_tsub_le, add_comm, add_tsub_cancel_right] exact natTrailingDegree_le_of_ne_zero hp · change p.mirror.coeff _ ≠ 0 rwa [coeff_mirror, revAt_invol] · exact fun n _ _ => p.coeff_mirror n theorem mirror_mirror : p.mirror.mirror = p := Polynomial.ext fun n => by rw [coeff_mirror, coeff_mirror, mirror_natDegree, mirror_natTrailingDegree, revAt_invol] variable {p q} theorem mirror_involutive : Function.Involutive (mirror : R[X] → R[X]) := mirror_mirror theorem mirror_eq_iff : p.mirror = q ↔ p = q.mirror := mirror_involutive.eq_iff @[simp] theorem mirror_inj : p.mirror = q.mirror ↔ p = q := mirror_involutive.injective.eq_iff	@[simp] theorem mirror_eq_zero : p.mirror = 0 ↔ p = 0 :=	Mathlib/Algebra/Polynomial/Mirror.lean	123	125
/- 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.MeasureTheory.MeasurableSpace.MeasurablyGenerated import Mathlib.MeasureTheory.Measure.NullMeasurable import Mathlib.Order.Interval.Set.Monotone /-! # Measure spaces The definition of a measure and a measure space are in `MeasureTheory.MeasureSpaceDef`, with only a few basic properties. This file provides many more properties of these objects. This separation allows the measurability tactic to import only the file `MeasureSpaceDef`, and to be available in `MeasureSpace` (through `MeasurableSpace`). Given a measurable space `α`, a measure on `α` is a function that sends measurable sets to the extended nonnegative reals that satisfies the following conditions: 1. `μ ∅ = 0`; 2. `μ` is countably additive. This means that the measure of a countable union of pairwise disjoint sets is equal to the measure of the individual sets. Every measure can be canonically extended to an outer measure, so that it assigns values to all subsets, not just the measurable subsets. On the other hand, a measure that is countably additive on measurable sets can be restricted to measurable sets to obtain a measure. In this file a measure is defined to be an outer measure that is countably additive on measurable sets, with the additional assumption that the outer measure is the canonical extension of the restricted measure. Measures on `α` form a complete lattice, and are closed under scalar multiplication with `ℝ≥0∞`. Given a measure, the null sets are the sets where `μ s = 0`, where `μ` denotes the corresponding outer measure (so `s` might not be measurable). We can then define the completion of `μ` as the measure on the least `σ`-algebra that also contains all null sets, by defining the measure to be `0` on the null sets. ## Main statements * `completion` is the completion of a measure to all null measurable sets. * `Measure.ofMeasurable` and `OuterMeasure.toMeasure` are two important ways to define a measure. ## Implementation notes Given `μ : Measure α`, `μ s` is the value of the outer measure applied to `s`. This conveniently allows us to apply the measure to sets without proving that they are measurable. We get countable subadditivity for all sets, but only countable additivity for measurable sets. You often don't want to define a measure via its constructor. Two ways that are sometimes more convenient: * `Measure.ofMeasurable` is a way to define a measure by only giving its value on measurable sets and proving the properties (1) and (2) mentioned above. * `OuterMeasure.toMeasure` is a way of obtaining a measure from an outer measure by showing that all measurable sets in the measurable space are Carathéodory measurable. To prove that two measures are equal, there are multiple options: * `ext`: two measures are equal if they are equal on all measurable sets. * `ext_of_generateFrom_of_iUnion`: two measures are equal if they are equal on a π-system generating the measurable sets, if the π-system contains a spanning increasing sequence of sets where the measures take finite value (in particular the measures are σ-finite). This is a special case of the more general `ext_of_generateFrom_of_cover` * `ext_of_generate_finite`: two finite measures are equal if they are equal on a π-system generating the measurable sets. This is a special case of `ext_of_generateFrom_of_iUnion` using `C ∪ {univ}`, but is easier to work with. A `MeasureSpace` is a class that is a measurable space with a canonical measure. The measure is denoted `volume`. ## References * <https://en.wikipedia.org/wiki/Measure_(mathematics)> * <https://en.wikipedia.org/wiki/Complete_measure> * <https://en.wikipedia.org/wiki/Almost_everywhere> ## Tags measure, almost everywhere, measure space, completion, null set, null measurable set -/ noncomputable section open Set open Filter hiding map open Function MeasurableSpace Topology Filter ENNReal NNReal Interval MeasureTheory open scoped symmDiff variable {α β γ δ ι R R' : Type} namespace MeasureTheory section variable {m : MeasurableSpace α} {μ μ₁ μ₂ : Measure α} {s s₁ s₂ t : Set α} instance ae_isMeasurablyGenerated : IsMeasurablyGenerated (ae μ) := ⟨fun _s hs => let ⟨t, hst, htm, htμ⟩ := exists_measurable_superset_of_null hs ⟨tᶜ, compl_mem_ae_iff.2 htμ, htm.compl, compl_subset_comm.1 hst⟩⟩ /-- See also `MeasureTheory.ae_restrict_uIoc_iff`. -/ theorem ae_uIoc_iff [LinearOrder α] {a b : α} {P : α → Prop} : (∀ᵐ x ∂μ, x ∈ Ι a b → P x) ↔ (∀ᵐ x ∂μ, x ∈ Ioc a b → P x) ∧ ∀ᵐ x ∂μ, x ∈ Ioc b a → P x := by simp only [uIoc_eq_union, mem_union, or_imp, eventually_and] theorem measure_union (hd : Disjoint s₁ s₂) (h : MeasurableSet s₂) : μ (s₁ ∪ s₂) = μ s₁ + μ s₂ := measure_union₀ h.nullMeasurableSet hd.aedisjoint theorem measure_union' (hd : Disjoint s₁ s₂) (h : MeasurableSet s₁) : μ (s₁ ∪ s₂) = μ s₁ + μ s₂ := measure_union₀' h.nullMeasurableSet hd.aedisjoint theorem measure_inter_add_diff (s : Set α) (ht : MeasurableSet t) : μ (s ∩ t) + μ (s \ t) = μ s := measure_inter_add_diff₀ _ ht.nullMeasurableSet theorem measure_diff_add_inter (s : Set α) (ht : MeasurableSet t) : μ (s \ t) + μ (s ∩ t) = μ s := (add_comm _ _).trans (measure_inter_add_diff s ht) theorem measure_diff_eq_top (hs : μ s = ∞) (ht : μ t ≠ ∞) : μ (s \ t) = ∞ := by contrapose! hs exact ((measure_mono (subset_diff_union s t)).trans_lt ((measure_union_le _ _).trans_lt (ENNReal.add_lt_top.2 ⟨hs.lt_top, ht.lt_top⟩))).ne theorem measure_union_add_inter (s : Set α) (ht : MeasurableSet t) : μ (s ∪ t) + μ (s ∩ t) = μ s + μ t := by rw [← measure_inter_add_diff (s ∪ t) ht, Set.union_inter_cancel_right, union_diff_right, ← measure_inter_add_diff s ht] ac_rfl theorem measure_union_add_inter' (hs : MeasurableSet s) (t : Set α) : μ (s ∪ t) + μ (s ∩ t) = μ s + μ t := by rw [union_comm, inter_comm, measure_union_add_inter t hs, add_comm] lemma measure_symmDiff_eq (hs : NullMeasurableSet s μ) (ht : NullMeasurableSet t μ) : μ (s ∆ t) = μ (s \ t) + μ (t \ s) := by simpa only [symmDiff_def, sup_eq_union] using measure_union₀ (ht.diff hs) disjoint_sdiff_sdiff.aedisjoint lemma measure_symmDiff_le (s t u : Set α) : μ (s ∆ u) ≤ μ (s ∆ t) + μ (t ∆ u) := le_trans (μ.mono <\| symmDiff_triangle s t u) (measure_union_le (s ∆ t) (t ∆ u)) theorem measure_symmDiff_eq_top (hs : μ s ≠ ∞) (ht : μ t = ∞) : μ (s ∆ t) = ∞ := measure_mono_top subset_union_right (measure_diff_eq_top ht hs) theorem measure_add_measure_compl (h : MeasurableSet s) : μ s + μ sᶜ = μ univ := measure_add_measure_compl₀ h.nullMeasurableSet theorem measure_biUnion₀ {s : Set β} {f : β → Set α} (hs : s.Countable) (hd : s.Pairwise (AEDisjoint μ on f)) (h : ∀ b ∈ s, NullMeasurableSet (f b) μ) : μ (⋃ b ∈ s, f b) = ∑' p : s, μ (f p) := by haveI := hs.toEncodable rw [biUnion_eq_iUnion] exact measure_iUnion₀ (hd.on_injective Subtype.coe_injective fun x => x.2) fun x => h x x.2 theorem measure_biUnion {s : Set β} {f : β → Set α} (hs : s.Countable) (hd : s.PairwiseDisjoint f) (h : ∀ b ∈ s, MeasurableSet (f b)) : μ (⋃ b ∈ s, f b) = ∑' p : s, μ (f p) := measure_biUnion₀ hs hd.aedisjoint fun b hb => (h b hb).nullMeasurableSet theorem measure_sUnion₀ {S : Set (Set α)} (hs : S.Countable) (hd : S.Pairwise (AEDisjoint μ)) (h : ∀ s ∈ S, NullMeasurableSet s μ) : μ (⋃₀ S) = ∑' s : S, μ s := by rw [sUnion_eq_biUnion, measure_biUnion₀ hs hd h] theorem measure_sUnion {S : Set (Set α)} (hs : S.Countable) (hd : S.Pairwise Disjoint) (h : ∀ s ∈ S, MeasurableSet s) : μ (⋃₀ S) = ∑' s : S, μ s := by rw [sUnion_eq_biUnion, measure_biUnion hs hd h] theorem measure_biUnion_finset₀ {s : Finset ι} {f : ι → Set α} (hd : Set.Pairwise (↑s) (AEDisjoint μ on f)) (hm : ∀ b ∈ s, NullMeasurableSet (f b) μ) : μ (⋃ b ∈ s, f b) = ∑ p ∈ s, μ (f p) := by rw [← Finset.sum_attach, Finset.attach_eq_univ, ← tsum_fintype] exact measure_biUnion₀ s.countable_toSet hd hm theorem measure_biUnion_finset {s : Finset ι} {f : ι → Set α} (hd : PairwiseDisjoint (↑s) f) (hm : ∀ b ∈ s, MeasurableSet (f b)) : μ (⋃ b ∈ s, f b) = ∑ p ∈ s, μ (f p) := measure_biUnion_finset₀ hd.aedisjoint fun b hb => (hm b hb).nullMeasurableSet /-- The measure of an a.e. disjoint union (even uncountable) of null-measurable sets is at least the sum of the measures of the sets. -/ theorem tsum_meas_le_meas_iUnion_of_disjoint₀ {ι : Type} {_ : MeasurableSpace α} (μ : Measure α) {As : ι → Set α} (As_mble : ∀ i : ι, NullMeasurableSet (As i) μ) (As_disj : Pairwise (AEDisjoint μ on As)) : (∑' i, μ (As i)) ≤ μ (⋃ i, As i) := by rw [ENNReal.tsum_eq_iSup_sum, iSup_le_iff] intro s simp only [← measure_biUnion_finset₀ (fun _i _hi _j _hj hij => As_disj hij) fun i _ => As_mble i] gcongr exact iUnion_subset fun _ ↦ Subset.rfl /-- The measure of a disjoint union (even uncountable) of measurable sets is at least the sum of the measures of the sets. -/ theorem tsum_meas_le_meas_iUnion_of_disjoint {ι : Type} {_ : MeasurableSpace α} (μ : Measure α) {As : ι → Set α} (As_mble : ∀ i : ι, MeasurableSet (As i)) (As_disj : Pairwise (Disjoint on As)) : (∑' i, μ (As i)) ≤ μ (⋃ i, As i) := tsum_meas_le_meas_iUnion_of_disjoint₀ μ (fun i ↦ (As_mble i).nullMeasurableSet) (fun _ _ h ↦ Disjoint.aedisjoint (As_disj h)) /-- If `s` is a countable set, then the measure of its preimage can be found as the sum of measures of the fibers `f ⁻¹' {y}`. -/ theorem tsum_measure_preimage_singleton {s : Set β} (hs : s.Countable) {f : α → β} (hf : ∀ y ∈ s, MeasurableSet (f ⁻¹' {y})) : (∑' b : s, μ (f ⁻¹' {↑b})) = μ (f ⁻¹' s) := by rw [← Set.biUnion_preimage_singleton, measure_biUnion hs (pairwiseDisjoint_fiber f s) hf] lemma measure_preimage_eq_zero_iff_of_countable {s : Set β} {f : α → β} (hs : s.Countable) : μ (f ⁻¹' s) = 0 ↔ ∀ x ∈ s, μ (f ⁻¹' {x}) = 0 := by rw [← biUnion_preimage_singleton, measure_biUnion_null_iff hs] /-- If `s` is a `Finset`, then the measure of its preimage can be found as the sum of measures of the fibers `f ⁻¹' {y}`. -/ theorem sum_measure_preimage_singleton (s : Finset β) {f : α → β} (hf : ∀ y ∈ s, MeasurableSet (f ⁻¹' {y})) : (∑ b ∈ s, μ (f ⁻¹' {b})) = μ (f ⁻¹' ↑s) := by simp only [← measure_biUnion_finset (pairwiseDisjoint_fiber f s) hf, Finset.set_biUnion_preimage_singleton] @[simp] lemma sum_measure_singleton {s : Finset α} [MeasurableSingletonClass α] : ∑ x ∈ s, μ {x} = μ s := by trans ∑ x ∈ s, μ (id ⁻¹' {x}) · simp rw [sum_measure_preimage_singleton] · simp · simp theorem measure_diff_null' (h : μ (s₁ ∩ s₂) = 0) : μ (s₁ \ s₂) = μ s₁ := measure_congr <\| diff_ae_eq_self.2 h theorem measure_add_diff (hs : NullMeasurableSet s μ) (t : Set α) : μ s + μ (t \ s) = μ (s ∪ t) := by rw [← measure_union₀' hs disjoint_sdiff_right.aedisjoint, union_diff_self] theorem measure_diff' (s : Set α) (hm : NullMeasurableSet t μ) (h_fin : μ t ≠ ∞) : μ (s \ t) = μ (s ∪ t) - μ t := ENNReal.eq_sub_of_add_eq h_fin <\| by rw [add_comm, measure_add_diff hm, union_comm] theorem measure_diff (h : s₂ ⊆ s₁) (h₂ : NullMeasurableSet s₂ μ) (h_fin : μ s₂ ≠ ∞) : μ (s₁ \ s₂) = μ s₁ - μ s₂ := by rw [measure_diff' _ h₂ h_fin, union_eq_self_of_subset_right h] theorem le_measure_diff : μ s₁ - μ s₂ ≤ μ (s₁ \ s₂) := tsub_le_iff_left.2 <\| (measure_le_inter_add_diff μ s₁ s₂).trans <\| by gcongr; apply inter_subset_right /-- If the measure of the symmetric difference of two sets is finite, then one has infinite measure if and only if the other one does. -/ theorem measure_eq_top_iff_of_symmDiff (hμst : μ (s ∆ t) ≠ ∞) : μ s = ∞ ↔ μ t = ∞ := by suffices h : ∀ u v, μ (u ∆ v) ≠ ∞ → μ u = ∞ → μ v = ∞ from ⟨h s t hμst, h t s (symmDiff_comm s t ▸ hμst)⟩ intro u v hμuv hμu by_contra! hμv apply hμuv rw [Set.symmDiff_def, eq_top_iff] calc ∞ = μ u - μ v := by rw [ENNReal.sub_eq_top_iff.2 ⟨hμu, hμv⟩] _ ≤ μ (u \ v) := le_measure_diff _ ≤ μ (u \ v ∪ v \ u) := measure_mono subset_union_left /-- If the measure of the symmetric difference of two sets is finite, then one has finite measure if and only if the other one does. -/ theorem measure_ne_top_iff_of_symmDiff (hμst : μ (s ∆ t) ≠ ∞) : μ s ≠ ∞ ↔ μ t ≠ ∞ := (measure_eq_top_iff_of_symmDiff hμst).ne theorem measure_diff_lt_of_lt_add (hs : NullMeasurableSet s μ) (hst : s ⊆ t) (hs' : μ s ≠ ∞) {ε : ℝ≥0∞} (h : μ t < μ s + ε) : μ (t \ s) < ε := by rw [measure_diff hst hs hs']; rw [add_comm] at h exact ENNReal.sub_lt_of_lt_add (measure_mono hst) h theorem measure_diff_le_iff_le_add (hs : NullMeasurableSet s μ) (hst : s ⊆ t) (hs' : μ s ≠ ∞) {ε : ℝ≥0∞} : μ (t \ s) ≤ ε ↔ μ t ≤ μ s + ε := by rw [measure_diff hst hs hs', tsub_le_iff_left] theorem measure_eq_measure_of_null_diff {s t : Set α} (hst : s ⊆ t) (h_nulldiff : μ (t \ s) = 0) : μ s = μ t := measure_congr <\| EventuallyLE.antisymm (HasSubset.Subset.eventuallyLE hst) (ae_le_set.mpr h_nulldiff) theorem measure_eq_measure_of_between_null_diff {s₁ s₂ s₃ : Set α} (h12 : s₁ ⊆ s₂) (h23 : s₂ ⊆ s₃) (h_nulldiff : μ (s₃ \ s₁) = 0) : μ s₁ = μ s₂ ∧ μ s₂ = μ s₃ := by have le12 : μ s₁ ≤ μ s₂ := measure_mono h12 have le23 : μ s₂ ≤ μ s₃ := measure_mono h23 have key : μ s₃ ≤ μ s₁ := calc μ s₃ = μ (s₃ \ s₁ ∪ s₁) := by rw [diff_union_of_subset (h12.trans h23)] _ ≤ μ (s₃ \ s₁) + μ s₁ := measure_union_le _ _ _ = μ s₁ := by simp only [h_nulldiff, zero_add] exact ⟨le12.antisymm (le23.trans key), le23.antisymm (key.trans le12)⟩ theorem measure_eq_measure_smaller_of_between_null_diff {s₁ s₂ s₃ : Set α} (h12 : s₁ ⊆ s₂) (h23 : s₂ ⊆ s₃) (h_nulldiff : μ (s₃ \ s₁) = 0) : μ s₁ = μ s₂ := (measure_eq_measure_of_between_null_diff h12 h23 h_nulldiff).1 theorem measure_eq_measure_larger_of_between_null_diff {s₁ s₂ s₃ : Set α} (h12 : s₁ ⊆ s₂) (h23 : s₂ ⊆ s₃) (h_nulldiff : μ (s₃ \ s₁) = 0) : μ s₂ = μ s₃ := (measure_eq_measure_of_between_null_diff h12 h23 h_nulldiff).2 lemma measure_compl₀ (h : NullMeasurableSet s μ) (hs : μ s ≠ ∞) : μ sᶜ = μ Set.univ - μ s := by rw [← measure_add_measure_compl₀ h, ENNReal.add_sub_cancel_left hs] theorem measure_compl (h₁ : MeasurableSet s) (h_fin : μ s ≠ ∞) : μ sᶜ = μ univ - μ s := measure_compl₀ h₁.nullMeasurableSet h_fin lemma measure_inter_conull' (ht : μ (s \ t) = 0) : μ (s ∩ t) = μ s := by rw [← diff_compl, measure_diff_null']; rwa [← diff_eq] lemma measure_inter_conull (ht : μ tᶜ = 0) : μ (s ∩ t) = μ s := by rw [← diff_compl, measure_diff_null ht] @[simp] theorem union_ae_eq_left_iff_ae_subset : (s ∪ t : Set α) =ᵐ[μ] s ↔ t ≤ᵐ[μ] s := by rw [ae_le_set] refine ⟨fun h => by simpa only [union_diff_left] using (ae_eq_set.mp h).1, fun h => eventuallyLE_antisymm_iff.mpr ⟨by rwa [ae_le_set, union_diff_left], HasSubset.Subset.eventuallyLE subset_union_left⟩⟩ @[simp] theorem union_ae_eq_right_iff_ae_subset : (s ∪ t : Set α) =ᵐ[μ] t ↔ s ≤ᵐ[μ] t := by rw [union_comm, union_ae_eq_left_iff_ae_subset] theorem ae_eq_of_ae_subset_of_measure_ge (h₁ : s ≤ᵐ[μ] t) (h₂ : μ t ≤ μ s) (hsm : NullMeasurableSet s μ) (ht : μ t ≠ ∞) : s =ᵐ[μ] t := by refine eventuallyLE_antisymm_iff.mpr ⟨h₁, ae_le_set.mpr ?_⟩ replace h₂ : μ t = μ s := h₂.antisymm (measure_mono_ae h₁) replace ht : μ s ≠ ∞ := h₂ ▸ ht rw [measure_diff' t hsm ht, measure_congr (union_ae_eq_left_iff_ae_subset.mpr h₁), h₂, tsub_self] /-- If `s ⊆ t`, `μ t ≤ μ s`, `μ t ≠ ∞`, and `s` is measurable, then `s =ᵐ[μ] t`. -/ theorem ae_eq_of_subset_of_measure_ge (h₁ : s ⊆ t) (h₂ : μ t ≤ μ s) (hsm : NullMeasurableSet s μ) (ht : μ t ≠ ∞) : s =ᵐ[μ] t := ae_eq_of_ae_subset_of_measure_ge (HasSubset.Subset.eventuallyLE h₁) h₂ hsm ht theorem measure_iUnion_congr_of_subset {ι : Sort} [Countable ι] {s : ι → Set α} {t : ι → Set α} (hsub : ∀ i, s i ⊆ t i) (h_le : ∀ i, μ (t i) ≤ μ (s i)) : μ (⋃ i, s i) = μ (⋃ i, t i) := by refine le_antisymm (by gcongr; apply hsub) ?_ rcases Classical.em (∃ i, μ (t i) = ∞) with (⟨i, hi⟩ \| htop) · calc μ (⋃ i, t i) ≤ ∞ := le_top _ ≤ μ (s i) := hi ▸ h_le i _ ≤ μ (⋃ i, s i) := measure_mono <\| subset_iUnion _ _ push_neg at htop set M := toMeasurable μ have H : ∀ b, (M (t b) ∩ M (⋃ b, s b) : Set α) =ᵐ[μ] M (t b) := by refine fun b => ae_eq_of_subset_of_measure_ge inter_subset_left ?_ ?_ ?_ · calc μ (M (t b)) = μ (t b) := measure_toMeasurable _ _ ≤ μ (s b) := h_le b _ ≤ μ (M (t b) ∩ M (⋃ b, s b)) := measure_mono <\| subset_inter ((hsub b).trans <\| subset_toMeasurable _ _) ((subset_iUnion _ _).trans <\| subset_toMeasurable _ _) · measurability · rw [measure_toMeasurable] exact htop b calc μ (⋃ b, t b) ≤ μ (⋃ b, M (t b)) := measure_mono (iUnion_mono fun b => subset_toMeasurable _ _) _ = μ (⋃ b, M (t b) ∩ M (⋃ b, s b)) := measure_congr (EventuallyEq.countable_iUnion H).symm _ ≤ μ (M (⋃ b, s b)) := measure_mono (iUnion_subset fun b => inter_subset_right) _ = μ (⋃ b, s b) := measure_toMeasurable _ theorem measure_union_congr_of_subset {t₁ t₂ : Set α} (hs : s₁ ⊆ s₂) (hsμ : μ s₂ ≤ μ s₁) (ht : t₁ ⊆ t₂) (htμ : μ t₂ ≤ μ t₁) : μ (s₁ ∪ t₁) = μ (s₂ ∪ t₂) := by rw [union_eq_iUnion, union_eq_iUnion] exact measure_iUnion_congr_of_subset (Bool.forall_bool.2 ⟨ht, hs⟩) (Bool.forall_bool.2 ⟨htμ, hsμ⟩) @[simp] theorem measure_iUnion_toMeasurable {ι : Sort} [Countable ι] (s : ι → Set α) : μ (⋃ i, toMeasurable μ (s i)) = μ (⋃ i, s i) := Eq.symm <\| measure_iUnion_congr_of_subset (fun _i => subset_toMeasurable _ _) fun _i ↦ (measure_toMeasurable _).le theorem measure_biUnion_toMeasurable {I : Set β} (hc : I.Countable) (s : β → Set α) : μ (⋃ b ∈ I, toMeasurable μ (s b)) = μ (⋃ b ∈ I, s b) := by haveI := hc.toEncodable simp only [biUnion_eq_iUnion, measure_iUnion_toMeasurable] @[simp] theorem measure_toMeasurable_union : μ (toMeasurable μ s ∪ t) = μ (s ∪ t) := Eq.symm <\| measure_union_congr_of_subset (subset_toMeasurable _ _) (measure_toMeasurable _).le Subset.rfl le_rfl @[simp] theorem measure_union_toMeasurable : μ (s ∪ toMeasurable μ t) = μ (s ∪ t) := Eq.symm <\| measure_union_congr_of_subset Subset.rfl le_rfl (subset_toMeasurable _ _) (measure_toMeasurable _).le theorem sum_measure_le_measure_univ {s : Finset ι} {t : ι → Set α} (h : ∀ i ∈ s, NullMeasurableSet (t i) μ) (H : Set.Pairwise s (AEDisjoint μ on t)) : (∑ i ∈ s, μ (t i)) ≤ μ (univ : Set α) := by rw [← measure_biUnion_finset₀ H h] exact measure_mono (subset_univ _) theorem tsum_measure_le_measure_univ {s : ι → Set α} (hs : ∀ i, NullMeasurableSet (s i) μ) (H : Pairwise (AEDisjoint μ on s)) : ∑' i, μ (s i) ≤ μ (univ : Set α) := by rw [ENNReal.tsum_eq_iSup_sum] exact iSup_le fun s => sum_measure_le_measure_univ (fun i _hi => hs i) fun i _hi j _hj hij => H hij /-- Pigeonhole principle for measure spaces: if `∑' i, μ (s i) > μ univ`, then one of the intersections `s i ∩ s j` is not empty. -/ theorem exists_nonempty_inter_of_measure_univ_lt_tsum_measure {m : MeasurableSpace α} (μ : Measure α) {s : ι → Set α} (hs : ∀ i, NullMeasurableSet (s i) μ) (H : μ (univ : Set α) < ∑' i, μ (s i)) : ∃ i j, i ≠ j ∧ (s i ∩ s j).Nonempty := by contrapose! H apply tsum_measure_le_measure_univ hs intro i j hij exact (disjoint_iff_inter_eq_empty.mpr (H i j hij)).aedisjoint /-- Pigeonhole principle for measure spaces: if `s` is a `Finset` and `∑ i ∈ s, μ (t i) > μ univ`, then one of the intersections `t i ∩ t j` is not empty. -/ theorem exists_nonempty_inter_of_measure_univ_lt_sum_measure {m : MeasurableSpace α} (μ : Measure α) {s : Finset ι} {t : ι → Set α} (h : ∀ i ∈ s, NullMeasurableSet (t i) μ) (H : μ (univ : Set α) < ∑ i ∈ s, μ (t i)) : ∃ i ∈ s, ∃ j ∈ s, ∃ _h : i ≠ j, (t i ∩ t j).Nonempty := by contrapose! H apply sum_measure_le_measure_univ h intro i hi j hj hij exact (disjoint_iff_inter_eq_empty.mpr (H i hi j hj hij)).aedisjoint /-- If two sets `s` and `t` are included in a set `u`, and `μ s + μ t > μ u`, then `s` intersects `t`. Version assuming that `t` is measurable. -/ theorem nonempty_inter_of_measure_lt_add {m : MeasurableSpace α} (μ : Measure α) {s t u : Set α} (ht : MeasurableSet t) (h's : s ⊆ u) (h't : t ⊆ u) (h : μ u < μ s + μ t) : (s ∩ t).Nonempty := by rw [← Set.not_disjoint_iff_nonempty_inter] contrapose! h calc μ s + μ t = μ (s ∪ t) := (measure_union h ht).symm _ ≤ μ u := measure_mono (union_subset h's h't) /-- If two sets `s` and `t` are included in a set `u`, and `μ s + μ t > μ u`, then `s` intersects `t`. Version assuming that `s` is measurable. -/ theorem nonempty_inter_of_measure_lt_add' {m : MeasurableSpace α} (μ : Measure α) {s t u : Set α} (hs : MeasurableSet s) (h's : s ⊆ u) (h't : t ⊆ u) (h : μ u < μ s + μ t) : (s ∩ t).Nonempty := by rw [add_comm] at h rw [inter_comm] exact nonempty_inter_of_measure_lt_add μ hs h't h's h /-- Continuity from below: the measure of the union of a directed sequence of (not necessarily measurable) sets is the supremum of the measures. -/ theorem _root_.Directed.measure_iUnion [Countable ι] {s : ι → Set α} (hd : Directed (· ⊆ ·) s) : μ (⋃ i, s i) = ⨆ i, μ (s i) := by -- WLOG, `ι = ℕ` rcases Countable.exists_injective_nat ι with ⟨e, he⟩ generalize ht : Function.extend e s ⊥ = t replace hd : Directed (· ⊆ ·) t := ht ▸ hd.extend_bot he suffices μ (⋃ n, t n) = ⨆ n, μ (t n) by simp only [← ht, Function.apply_extend μ, ← iSup_eq_iUnion, iSup_extend_bot he, Function.comp_def, Pi.bot_apply, bot_eq_empty, measure_empty] at this exact this.trans (iSup_extend_bot he _) clear! ι -- The `≥` inequality is trivial refine le_antisymm ?_ (iSup_le fun i ↦ measure_mono <\| subset_iUnion _ _) -- Choose `T n ⊇ t n` of the same measure, put `Td n = disjointed T` set T : ℕ → Set α := fun n => toMeasurable μ (t n) set Td : ℕ → Set α := disjointed T have hm : ∀ n, MeasurableSet (Td n) := .disjointed fun n ↦ measurableSet_toMeasurable _ _ calc μ (⋃ n, t n) = μ (⋃ n, Td n) := by rw [iUnion_disjointed, measure_iUnion_toMeasurable] _ ≤ ∑' n, μ (Td n) := measure_iUnion_le _ _ = ⨆ I : Finset ℕ, ∑ n ∈ I, μ (Td n) := ENNReal.tsum_eq_iSup_sum _ ≤ ⨆ n, μ (t n) := iSup_le fun I => by rcases hd.finset_le I with ⟨N, hN⟩ calc (∑ n ∈ I, μ (Td n)) = μ (⋃ n ∈ I, Td n) := (measure_biUnion_finset ((disjoint_disjointed T).set_pairwise I) fun n _ => hm n).symm _ ≤ μ (⋃ n ∈ I, T n) := measure_mono (iUnion₂_mono fun n _hn => disjointed_subset _ _) _ = μ (⋃ n ∈ I, t n) := measure_biUnion_toMeasurable I.countable_toSet _ _ ≤ μ (t N) := measure_mono (iUnion₂_subset hN) _ ≤ ⨆ n, μ (t n) := le_iSup (μ ∘ t) N /-- Continuity from below: the measure of the union of a monotone family of sets is equal to the supremum of their measures. The theorem assumes that the `atTop` filter on the index set is countably generated, so it works for a family indexed by a countable type, as well as `ℝ`. -/ theorem _root_.Monotone.measure_iUnion [Preorder ι] [IsDirected ι (· ≤ ·)] [(atTop : Filter ι).IsCountablyGenerated] {s : ι → Set α} (hs : Monotone s) : μ (⋃ i, s i) = ⨆ i, μ (s i) := by cases isEmpty_or_nonempty ι with \| inl _ => simp \| inr _ => rcases exists_seq_monotone_tendsto_atTop_atTop ι with ⟨x, hxm, hx⟩ rw [← hs.iUnion_comp_tendsto_atTop hx, ← Monotone.iSup_comp_tendsto_atTop _ hx] exacts [(hs.comp hxm).directed_le.measure_iUnion, fun _ _ h ↦ measure_mono (hs h)] theorem _root_.Antitone.measure_iUnion [Preorder ι] [IsDirected ι (· ≥ ·)] [(atBot : Filter ι).IsCountablyGenerated] {s : ι → Set α} (hs : Antitone s) : μ (⋃ i, s i) = ⨆ i, μ (s i) := hs.dual_left.measure_iUnion /-- Continuity from below: the measure of the union of a sequence of (not necessarily measurable) sets is the supremum of the measures of the partial unions. -/ theorem measure_iUnion_eq_iSup_accumulate [Preorder ι] [IsDirected ι (· ≤ ·)] [(atTop : Filter ι).IsCountablyGenerated] {f : ι → Set α} : μ (⋃ i, f i) = ⨆ i, μ (Accumulate f i) := by rw [← iUnion_accumulate] exact monotone_accumulate.measure_iUnion theorem measure_biUnion_eq_iSup {s : ι → Set α} {t : Set ι} (ht : t.Countable) (hd : DirectedOn ((· ⊆ ·) on s) t) : μ (⋃ i ∈ t, s i) = ⨆ i ∈ t, μ (s i) := by haveI := ht.to_subtype rw [biUnion_eq_iUnion, hd.directed_val.measure_iUnion, ← iSup_subtype''] /-- Continuity from above: the measure of the intersection of a directed downwards countable family of measurable sets is the infimum of the measures. -/ theorem _root_.Directed.measure_iInter [Countable ι] {s : ι → Set α} (h : ∀ i, NullMeasurableSet (s i) μ) (hd : Directed (· ⊇ ·) s) (hfin : ∃ i, μ (s i) ≠ ∞) : μ (⋂ i, s i) = ⨅ i, μ (s i) := by rcases hfin with ⟨k, hk⟩ have : ∀ t ⊆ s k, μ t ≠ ∞ := fun t ht => ne_top_of_le_ne_top hk (measure_mono ht) rw [← ENNReal.sub_sub_cancel hk (iInf_le (fun i => μ (s i)) k), ENNReal.sub_iInf, ← ENNReal.sub_sub_cancel hk (measure_mono (iInter_subset _ k)), ← measure_diff (iInter_subset _ k) (.iInter h) (this _ (iInter_subset _ k)), diff_iInter, Directed.measure_iUnion] · congr 1 refine le_antisymm (iSup_mono' fun i => ?_) (iSup_mono fun i => le_measure_diff) rcases hd i k with ⟨j, hji, hjk⟩ use j rw [← measure_diff hjk (h _) (this _ hjk)] gcongr · exact hd.mono_comp _ fun _ _ => diff_subset_diff_right /-- Continuity from above: the measure of the intersection of a monotone family of measurable sets indexed by a type with countably generated `atBot` filter is equal to the infimum of the measures. -/ theorem _root_.Monotone.measure_iInter [Preorder ι] [IsDirected ι (· ≥ ·)] [(atBot : Filter ι).IsCountablyGenerated] {s : ι → Set α} (hs : Monotone s) (hsm : ∀ i, NullMeasurableSet (s i) μ) (hfin : ∃ i, μ (s i) ≠ ∞) : μ (⋂ i, s i) = ⨅ i, μ (s i) := by refine le_antisymm (le_iInf fun i ↦ measure_mono <\| iInter_subset _ _) ?_ have := hfin.nonempty rcases exists_seq_antitone_tendsto_atTop_atBot ι with ⟨x, hxm, hx⟩ calc ⨅ i, μ (s i) ≤ ⨅ n, μ (s (x n)) := le_iInf_comp (μ ∘ s) x _ = μ (⋂ n, s (x n)) := by refine .symm <\| (hs.comp_antitone hxm).directed_ge.measure_iInter (fun n ↦ hsm _) ?_ rcases hfin with ⟨k, hk⟩ rcases (hx.eventually_le_atBot k).exists with ⟨n, hn⟩ exact ⟨n, ne_top_of_le_ne_top hk <\| measure_mono <\| hs hn⟩ _ ≤ μ (⋂ i, s i) := by refine measure_mono <\| iInter_mono' fun i ↦ ?_ rcases (hx.eventually_le_atBot i).exists with ⟨n, hn⟩ exact ⟨n, hs hn⟩ /-- Continuity from above: the measure of the intersection of an antitone family of measurable sets indexed by a type with countably generated `atTop` filter is equal to the infimum of the measures. -/ theorem _root_.Antitone.measure_iInter [Preorder ι] [IsDirected ι (· ≤ ·)] [(atTop : Filter ι).IsCountablyGenerated] {s : ι → Set α} (hs : Antitone s) (hsm : ∀ i, NullMeasurableSet (s i) μ) (hfin : ∃ i, μ (s i) ≠ ∞) : μ (⋂ i, s i) = ⨅ i, μ (s i) := hs.dual_left.measure_iInter hsm hfin /-- Continuity from above: the measure of the intersection of a sequence of measurable sets is the infimum of the measures of the partial intersections. -/ theorem measure_iInter_eq_iInf_measure_iInter_le {α ι : Type} {_ : MeasurableSpace α} {μ : Measure α} [Countable ι] [Preorder ι] [IsDirected ι (· ≤ ·)] {f : ι → Set α} (h : ∀ i, NullMeasurableSet (f i) μ) (hfin : ∃ i, μ (f i) ≠ ∞) : μ (⋂ i, f i) = ⨅ i, μ (⋂ j ≤ i, f j) := by rw [← Antitone.measure_iInter] · rw [iInter_comm] exact congrArg μ <\| iInter_congr fun i ↦ (biInf_const nonempty_Ici).symm · exact fun i j h ↦ biInter_mono (Iic_subset_Iic.2 h) fun _ _ ↦ Set.Subset.rfl · exact fun i ↦ .biInter (to_countable _) fun _ _ ↦ h _ · refine hfin.imp fun k hk ↦ ne_top_of_le_ne_top hk <\| measure_mono <\| iInter₂_subset k ?_ rfl /-- Continuity from below: the measure of the union of an increasing sequence of (not necessarily measurable) sets is the limit of the measures. -/ theorem tendsto_measure_iUnion_atTop [Preorder ι] [IsCountablyGenerated (atTop : Filter ι)] {s : ι → Set α} (hm : Monotone s) : Tendsto (μ ∘ s) atTop (𝓝 (μ (⋃ n, s n))) := by refine .of_neBot_imp fun h ↦ ?_ have := (atTop_neBot_iff.1 h).2 rw [hm.measure_iUnion] exact tendsto_atTop_iSup fun n m hnm => measure_mono <\| hm hnm theorem tendsto_measure_iUnion_atBot [Preorder ι] [IsCountablyGenerated (atBot : Filter ι)] {s : ι → Set α} (hm : Antitone s) : Tendsto (μ ∘ s) atBot (𝓝 (μ (⋃ n, s n))) := tendsto_measure_iUnion_atTop (ι := ιᵒᵈ) hm.dual_left /-- Continuity from below: the measure of the union of a sequence of (not necessarily measurable) sets is the limit of the measures of the partial unions. -/ theorem tendsto_measure_iUnion_accumulate {α ι : Type} [Preorder ι] [IsCountablyGenerated (atTop : Filter ι)] {_ : MeasurableSpace α} {μ : Measure α} {f : ι → Set α} : Tendsto (fun i ↦ μ (Accumulate f i)) atTop (𝓝 (μ (⋃ i, f i))) := by refine .of_neBot_imp fun h ↦ ?_ have := (atTop_neBot_iff.1 h).2 rw [measure_iUnion_eq_iSup_accumulate] exact tendsto_atTop_iSup fun i j hij ↦ by gcongr /-- Continuity from above: the measure of the intersection of a decreasing sequence of measurable sets is the limit of the measures. -/ theorem tendsto_measure_iInter_atTop [Preorder ι] [IsCountablyGenerated (atTop : Filter ι)] {s : ι → Set α} (hs : ∀ i, NullMeasurableSet (s i) μ) (hm : Antitone s) (hf : ∃ i, μ (s i) ≠ ∞) : Tendsto (μ ∘ s) atTop (𝓝 (μ (⋂ n, s n))) := by refine .of_neBot_imp fun h ↦ ?_ have := (atTop_neBot_iff.1 h).2 rw [hm.measure_iInter hs hf] exact tendsto_atTop_iInf fun n m hnm => measure_mono <\| hm hnm /-- Continuity from above: the measure of the intersection of an increasing sequence of measurable sets is the limit of the measures. -/ theorem tendsto_measure_iInter_atBot [Preorder ι] [IsCountablyGenerated (atBot : Filter ι)] {s : ι → Set α} (hs : ∀ i, NullMeasurableSet (s i) μ) (hm : Monotone s) (hf : ∃ i, μ (s i) ≠ ∞) : Tendsto (μ ∘ s) atBot (𝓝 (μ (⋂ n, s n))) := tendsto_measure_iInter_atTop (ι := ιᵒᵈ) hs hm.dual_left hf /-- Continuity from above: the measure of the intersection of a sequence of measurable sets such that one has finite measure is the limit of the measures of the partial intersections. -/ theorem tendsto_measure_iInter_le {α ι : Type} {_ : MeasurableSpace α} {μ : Measure α} [Countable ι] [Preorder ι] {f : ι → Set α} (hm : ∀ i, NullMeasurableSet (f i) μ) (hf : ∃ i, μ (f i) ≠ ∞) : Tendsto (fun i ↦ μ (⋂ j ≤ i, f j)) atTop (𝓝 (μ (⋂ i, f i))) := by refine .of_neBot_imp fun hne ↦ ?_ cases atTop_neBot_iff.mp hne rw [measure_iInter_eq_iInf_measure_iInter_le hm hf] exact tendsto_atTop_iInf fun i j hij ↦ measure_mono <\| biInter_subset_biInter_left fun k hki ↦ le_trans hki hij /-- Some version of continuity of a measure in the empty set using the intersection along a set of sets. -/ theorem exists_measure_iInter_lt {α ι : Type} {_ : MeasurableSpace α} {μ : Measure α} [SemilatticeSup ι] [Countable ι] {f : ι → Set α} (hm : ∀ i, NullMeasurableSet (f i) μ) {ε : ℝ≥0∞} (hε : 0 < ε) (hfin : ∃ i, μ (f i) ≠ ∞) (hfem : ⋂ n, f n = ∅) : ∃ m, μ (⋂ n ≤ m, f n) < ε := by let F m := μ (⋂ n ≤ m, f n) have hFAnti : Antitone F := fun i j hij => measure_mono (biInter_subset_biInter_left fun k hki => le_trans hki hij) suffices Filter.Tendsto F Filter.atTop (𝓝 0) by rw [@ENNReal.tendsto_atTop_zero_iff_lt_of_antitone _ (nonempty_of_exists hfin) _ _ hFAnti] at this exact this ε hε have hzero : μ (⋂ n, f n) = 0 := by simp only [hfem, measure_empty] rw [← hzero] exact tendsto_measure_iInter_le hm hfin /-- The measure of the intersection of a decreasing sequence of measurable sets indexed by a linear order with first countable topology is the limit of the measures. -/ theorem tendsto_measure_biInter_gt {ι : Type} [LinearOrder ι] [TopologicalSpace ι] [OrderTopology ι] [DenselyOrdered ι] [FirstCountableTopology ι] {s : ι → Set α} {a : ι} (hs : ∀ r > a, NullMeasurableSet (s r) μ) (hm : ∀ i j, a < i → i ≤ j → s i ⊆ s j) (hf : ∃ r > a, μ (s r) ≠ ∞) : Tendsto (μ ∘ s) (𝓝[Ioi a] a) (𝓝 (μ (⋂ r > a, s r))) := by have : (atBot : Filter (Ioi a)).IsCountablyGenerated := by rw [← comap_coe_Ioi_nhdsGT] infer_instance simp_rw [← map_coe_Ioi_atBot, tendsto_map'_iff, ← mem_Ioi, biInter_eq_iInter] apply tendsto_measure_iInter_atBot · rwa [Subtype.forall] · exact fun i j h ↦ hm i j i.2 h · simpa only [Subtype.exists, exists_prop] theorem measure_if {x : β} {t : Set β} {s : Set α} [Decidable (x ∈ t)] : μ (if x ∈ t then s else ∅) = indicator t (fun _ => μ s) x := by split_ifs with h <;> simp [h] end section OuterMeasure variable [ms : MeasurableSpace α] {s t : Set α} /-- Obtain a measure by giving an outer measure where all sets in the σ-algebra are Carathéodory measurable. -/ def OuterMeasure.toMeasure (m : OuterMeasure α) (h : ms ≤ m.caratheodory) : Measure α := Measure.ofMeasurable (fun s _ => m s) m.empty fun _f hf hd => m.iUnion_eq_of_caratheodory (fun i => h _ (hf i)) hd theorem le_toOuterMeasure_caratheodory (μ : Measure α) : ms ≤ μ.toOuterMeasure.caratheodory := fun _s hs _t => (measure_inter_add_diff _ hs).symm @[simp] theorem toMeasure_toOuterMeasure (m : OuterMeasure α) (h : ms ≤ m.caratheodory) : (m.toMeasure h).toOuterMeasure = m.trim := rfl @[simp] theorem toMeasure_apply (m : OuterMeasure α) (h : ms ≤ m.caratheodory) {s : Set α} (hs : MeasurableSet s) : m.toMeasure h s = m s := m.trim_eq hs theorem le_toMeasure_apply (m : OuterMeasure α) (h : ms ≤ m.caratheodory) (s : Set α) : m s ≤ m.toMeasure h s := m.le_trim s theorem toMeasure_apply₀ (m : OuterMeasure α) (h : ms ≤ m.caratheodory) {s : Set α} (hs : NullMeasurableSet s (m.toMeasure h)) : m.toMeasure h s = m s := by refine le_antisymm ?_ (le_toMeasure_apply _ _ _) rcases hs.exists_measurable_subset_ae_eq with ⟨t, hts, htm, heq⟩ calc m.toMeasure h s = m.toMeasure h t := measure_congr heq.symm _ = m t := toMeasure_apply m h htm _ ≤ m s := m.mono hts @[simp] theorem toOuterMeasure_toMeasure {μ : Measure α} : μ.toOuterMeasure.toMeasure (le_toOuterMeasure_caratheodory _) = μ := Measure.ext fun _s => μ.toOuterMeasure.trim_eq @[simp] theorem boundedBy_measure (μ : Measure α) : OuterMeasure.boundedBy μ = μ.toOuterMeasure := μ.toOuterMeasure.boundedBy_eq_self end OuterMeasure section variable {m0 : MeasurableSpace α} {mβ : MeasurableSpace β} [MeasurableSpace γ] variable {μ μ₁ μ₂ μ₃ ν ν' ν₁ ν₂ : Measure α} {s s' t : Set α} namespace Measure /-- If `u` is a superset of `t` with the same (finite) measure (both sets possibly non-measurable), then for any measurable set `s` one also has `μ (t ∩ s) = μ (u ∩ s)`. -/ theorem measure_inter_eq_of_measure_eq {s t u : Set α} (hs : MeasurableSet s) (h : μ t = μ u) (htu : t ⊆ u) (ht_ne_top : μ t ≠ ∞) : μ (t ∩ s) = μ (u ∩ s) := by rw [h] at ht_ne_top refine le_antisymm (by gcongr) ?_ have A : μ (u ∩ s) + μ (u \ s) ≤ μ (t ∩ s) + μ (u \ s) := calc μ (u ∩ s) + μ (u \ s) = μ u := measure_inter_add_diff _ hs _ = μ t := h.symm _ = μ (t ∩ s) + μ (t \ s) := (measure_inter_add_diff _ hs).symm _ ≤ μ (t ∩ s) + μ (u \ s) := by gcongr have B : μ (u \ s) ≠ ∞ := (lt_of_le_of_lt (measure_mono diff_subset) ht_ne_top.lt_top).ne exact ENNReal.le_of_add_le_add_right B A /-- The measurable superset `toMeasurable μ t` of `t` (which has the same measure as `t`) satisfies, for any measurable set `s`, the equality `μ (toMeasurable μ t ∩ s) = μ (u ∩ s)`. Here, we require that the measure of `t` is finite. The conclusion holds without this assumption when the measure is s-finite (for example when it is σ-finite), see `measure_toMeasurable_inter_of_sFinite`. -/ theorem measure_toMeasurable_inter {s t : Set α} (hs : MeasurableSet s) (ht : μ t ≠ ∞) : μ (toMeasurable μ t ∩ s) = μ (t ∩ s) := (measure_inter_eq_of_measure_eq hs (measure_toMeasurable t).symm (subset_toMeasurable μ t) ht).symm /-! ### The `ℝ≥0∞`-module of measures -/ instance instZero {_ : MeasurableSpace α} : Zero (Measure α) := ⟨{ toOuterMeasure := 0 m_iUnion := fun _f _hf _hd => tsum_zero.symm trim_le := OuterMeasure.trim_zero.le }⟩ @[simp] theorem zero_toOuterMeasure {_m : MeasurableSpace α} : (0 : Measure α).toOuterMeasure = 0 := rfl @[simp, norm_cast] theorem coe_zero {_m : MeasurableSpace α} : ⇑(0 : Measure α) = 0 := rfl @[simp] lemma _root_.MeasureTheory.OuterMeasure.toMeasure_zero [ms : MeasurableSpace α] (h : ms ≤ (0 : OuterMeasure α).caratheodory) : (0 : OuterMeasure α).toMeasure h = 0 := by ext s hs simp [hs] @[simp] lemma _root_.MeasureTheory.OuterMeasure.toMeasure_eq_zero {ms : MeasurableSpace α} {μ : OuterMeasure α} (h : ms ≤ μ.caratheodory) : μ.toMeasure h = 0 ↔ μ = 0 where mp hμ := by ext s; exact le_bot_iff.1 <\| (le_toMeasure_apply _ _ _).trans_eq congr($hμ s) mpr := by rintro rfl; simp @[nontriviality] lemma apply_eq_zero_of_isEmpty [IsEmpty α] {_ : MeasurableSpace α} (μ : Measure α) (s : Set α) : μ s = 0 := by rw [eq_empty_of_isEmpty s, measure_empty] instance instSubsingleton [IsEmpty α] {m : MeasurableSpace α} : Subsingleton (Measure α) := ⟨fun μ ν => by ext1 s _; rw [apply_eq_zero_of_isEmpty, apply_eq_zero_of_isEmpty]⟩ theorem eq_zero_of_isEmpty [IsEmpty α] {_m : MeasurableSpace α} (μ : Measure α) : μ = 0 := Subsingleton.elim μ 0 instance instInhabited {_ : MeasurableSpace α} : Inhabited (Measure α) := ⟨0⟩ instance instAdd {_ : MeasurableSpace α} : Add (Measure α) := ⟨fun μ₁ μ₂ => { toOuterMeasure := μ₁.toOuterMeasure + μ₂.toOuterMeasure m_iUnion := fun s hs hd => show μ₁ (⋃ i, s i) + μ₂ (⋃ i, s i) = ∑' i, (μ₁ (s i) + μ₂ (s i)) by rw [ENNReal.tsum_add, measure_iUnion hd hs, measure_iUnion hd hs] trim_le := by rw [OuterMeasure.trim_add, μ₁.trimmed, μ₂.trimmed] }⟩ @[simp] theorem add_toOuterMeasure {_m : MeasurableSpace α} (μ₁ μ₂ : Measure α) : (μ₁ + μ₂).toOuterMeasure = μ₁.toOuterMeasure + μ₂.toOuterMeasure := rfl @[simp, norm_cast] theorem coe_add {_m : MeasurableSpace α} (μ₁ μ₂ : Measure α) : ⇑(μ₁ + μ₂) = μ₁ + μ₂ := rfl theorem add_apply {_m : MeasurableSpace α} (μ₁ μ₂ : Measure α) (s : Set α) : (μ₁ + μ₂) s = μ₁ s + μ₂ s := rfl section SMul variable [SMul R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] variable [SMul R' ℝ≥0∞] [IsScalarTower R' ℝ≥0∞ ℝ≥0∞] instance instSMul {_ : MeasurableSpace α} : SMul R (Measure α) := ⟨fun c μ => { toOuterMeasure := c • μ.toOuterMeasure m_iUnion := fun s hs hd => by simp only [OuterMeasure.smul_apply, coe_toOuterMeasure, ENNReal.tsum_const_smul, measure_iUnion hd hs] trim_le := by rw [OuterMeasure.trim_smul, μ.trimmed] }⟩ @[simp] theorem smul_toOuterMeasure {_m : MeasurableSpace α} (c : R) (μ : Measure α) : (c • μ).toOuterMeasure = c • μ.toOuterMeasure := rfl @[simp, norm_cast] theorem coe_smul {_m : MeasurableSpace α} (c : R) (μ : Measure α) : ⇑(c • μ) = c • ⇑μ := rfl @[simp] theorem smul_apply {_m : MeasurableSpace α} (c : R) (μ : Measure α) (s : Set α) : (c • μ) s = c • μ s := rfl instance instSMulCommClass [SMulCommClass R R' ℝ≥0∞] {_ : MeasurableSpace α} : SMulCommClass R R' (Measure α) := ⟨fun _ _ _ => ext fun _ _ => smul_comm _ _ _⟩ instance instIsScalarTower [SMul R R'] [IsScalarTower R R' ℝ≥0∞] {_ : MeasurableSpace α} : IsScalarTower R R' (Measure α) := ⟨fun _ _ _ => ext fun _ _ => smul_assoc _ _ _⟩ instance instIsCentralScalar [SMul Rᵐᵒᵖ ℝ≥0∞] [IsCentralScalar R ℝ≥0∞] {_ : MeasurableSpace α} : IsCentralScalar R (Measure α) := ⟨fun _ _ => ext fun _ _ => op_smul_eq_smul _ _⟩ end SMul instance instNoZeroSMulDivisors [Zero R] [SMulWithZero R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] [NoZeroSMulDivisors R ℝ≥0∞] : NoZeroSMulDivisors R (Measure α) where eq_zero_or_eq_zero_of_smul_eq_zero h := by simpa [Ne, ext_iff', forall_or_left] using h instance instMulAction [Monoid R] [MulAction R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] {_ : MeasurableSpace α} : MulAction R (Measure α) := Injective.mulAction _ toOuterMeasure_injective smul_toOuterMeasure instance instAddCommMonoid {_ : MeasurableSpace α} : AddCommMonoid (Measure α) := toOuterMeasure_injective.addCommMonoid toOuterMeasure zero_toOuterMeasure add_toOuterMeasure fun _ _ => smul_toOuterMeasure _ _ /-- Coercion to function as an additive monoid homomorphism. -/ def coeAddHom {_ : MeasurableSpace α} : Measure α →+ Set α → ℝ≥0∞ where toFun := (⇑) map_zero' := coe_zero map_add' := coe_add @[simp] theorem coeAddHom_apply {_ : MeasurableSpace α} (μ : Measure α) : coeAddHom μ = ⇑μ := rfl @[simp] theorem coe_finset_sum {_m : MeasurableSpace α} (I : Finset ι) (μ : ι → Measure α) : ⇑(∑ i ∈ I, μ i) = ∑ i ∈ I, ⇑(μ i) := map_sum coeAddHom μ I theorem finset_sum_apply {m : MeasurableSpace α} (I : Finset ι) (μ : ι → Measure α) (s : Set α) : (∑ i ∈ I, μ i) s = ∑ i ∈ I, μ i s := by rw [coe_finset_sum, Finset.sum_apply] instance instDistribMulAction [Monoid R] [DistribMulAction R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] {_ : MeasurableSpace α} : DistribMulAction R (Measure α) := Injective.distribMulAction ⟨⟨toOuterMeasure, zero_toOuterMeasure⟩, add_toOuterMeasure⟩ toOuterMeasure_injective smul_toOuterMeasure instance instModule [Semiring R] [Module R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] {_ : MeasurableSpace α} : Module R (Measure α) := Injective.module R ⟨⟨toOuterMeasure, zero_toOuterMeasure⟩, add_toOuterMeasure⟩ toOuterMeasure_injective smul_toOuterMeasure @[simp] theorem coe_nnreal_smul_apply {_m : MeasurableSpace α} (c : ℝ≥0) (μ : Measure α) (s : Set α) : (c • μ) s = c * μ s := rfl @[simp] theorem nnreal_smul_coe_apply {_m : MeasurableSpace α} (c : ℝ≥0) (μ : Measure α) (s : Set α) : c • μ s = c * μ s := by rfl theorem ae_smul_measure {p : α → Prop} [SMul R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] (h : ∀ᵐ x ∂μ, p x) (c : R) : ∀ᵐ x ∂c • μ, p x := ae_iff.2 <\| by rw [smul_apply, ae_iff.1 h, ← smul_one_smul ℝ≥0∞, smul_zero] theorem ae_smul_measure_le [SMul R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] (c : R) : ae (c • μ) ≤ ae μ := fun _ h ↦ ae_smul_measure h c section SMulWithZero variable {R : Type} [Zero R] [SMulWithZero R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] [NoZeroSMulDivisors R ℝ≥0∞] {c : R} {p : α → Prop} lemma ae_smul_measure_iff (hc : c ≠ 0) {μ : Measure α} : (∀ᵐ x ∂c • μ, p x) ↔ ∀ᵐ x ∂μ, p x := by simp [ae_iff, hc] @[simp] lemma ae_smul_measure_eq (hc : c ≠ 0) (μ : Measure α) : ae (c • μ) = ae μ := by ext; exact ae_smul_measure_iff hc end SMulWithZero theorem measure_eq_left_of_subset_of_measure_add_eq {s t : Set α} (h : (μ + ν) t ≠ ∞) (h' : s ⊆ t) (h'' : (μ + ν) s = (μ + ν) t) : μ s = μ t := by refine le_antisymm (measure_mono h') ?_ have : μ t + ν t ≤ μ s + ν t := calc μ t + ν t = μ s + ν s := h''.symm _ ≤ μ s + ν t := by gcongr apply ENNReal.le_of_add_le_add_right _ this exact ne_top_of_le_ne_top h (le_add_left le_rfl) theorem measure_eq_right_of_subset_of_measure_add_eq {s t : Set α} (h : (μ + ν) t ≠ ∞) (h' : s ⊆ t) (h'' : (μ + ν) s = (μ + ν) t) : ν s = ν t := by rw [add_comm] at h'' h exact measure_eq_left_of_subset_of_measure_add_eq h h' h'' theorem measure_toMeasurable_add_inter_left {s t : Set α} (hs : MeasurableSet s) (ht : (μ + ν) t ≠ ∞) : μ (toMeasurable (μ + ν) t ∩ s) = μ (t ∩ s) := by refine (measure_inter_eq_of_measure_eq hs ?_ (subset_toMeasurable _ _) ?_).symm · refine measure_eq_left_of_subset_of_measure_add_eq ?_ (subset_toMeasurable _ _) (measure_toMeasurable t).symm rwa [measure_toMeasurable t] · simp only [not_or, ENNReal.add_eq_top, Pi.add_apply, Ne, coe_add] at ht exact ht.1 theorem measure_toMeasurable_add_inter_right {s t : Set α} (hs : MeasurableSet s) (ht : (μ + ν) t ≠ ∞) : ν (toMeasurable (μ + ν) t ∩ s) = ν (t ∩ s) := by rw [add_comm] at ht ⊢ exact measure_toMeasurable_add_inter_left hs ht /-! ### The complete lattice of measures -/ /-- Measures are partially ordered. -/ instance instPartialOrder {_ : MeasurableSpace α} : PartialOrder (Measure α) where le m₁ m₂ := ∀ s, m₁ s ≤ m₂ s le_refl _ _ := le_rfl le_trans _ _ _ h₁ h₂ s := le_trans (h₁ s) (h₂ s) le_antisymm _ _ h₁ h₂ := ext fun s _ => le_antisymm (h₁ s) (h₂ s) theorem toOuterMeasure_le : μ₁.toOuterMeasure ≤ μ₂.toOuterMeasure ↔ μ₁ ≤ μ₂ := .rfl theorem le_iff : μ₁ ≤ μ₂ ↔ ∀ s, MeasurableSet s → μ₁ s ≤ μ₂ s := outerMeasure_le_iff theorem le_intro (h : ∀ s, MeasurableSet s → s.Nonempty → μ₁ s ≤ μ₂ s) : μ₁ ≤ μ₂ := le_iff.2 fun s hs ↦ s.eq_empty_or_nonempty.elim (by rintro rfl; simp) (h s hs) theorem le_iff' : μ₁ ≤ μ₂ ↔ ∀ s, μ₁ s ≤ μ₂ s := .rfl theorem lt_iff : μ < ν ↔ μ ≤ ν ∧ ∃ s, MeasurableSet s ∧ μ s < ν s := lt_iff_le_not_le.trans <\| and_congr Iff.rfl <\| by simp only [le_iff, not_forall, not_le, exists_prop] theorem lt_iff' : μ < ν ↔ μ ≤ ν ∧ ∃ s, μ s < ν s := lt_iff_le_not_le.trans <\| and_congr Iff.rfl <\| by simp only [le_iff', not_forall, not_le] instance instAddLeftMono {_ : MeasurableSpace α} : AddLeftMono (Measure α) := ⟨fun _ν _μ₁ _μ₂ hμ s => add_le_add_left (hμ s) _⟩ protected theorem le_add_left (h : μ ≤ ν) : μ ≤ ν' + ν := fun s => le_add_left (h s) protected theorem le_add_right (h : μ ≤ ν) : μ ≤ ν + ν' := fun s => le_add_right (h s) section sInf variable {m : Set (Measure α)} theorem sInf_caratheodory (s : Set α) (hs : MeasurableSet s) : MeasurableSet[(sInf (toOuterMeasure '' m)).caratheodory] s := by rw [OuterMeasure.sInf_eq_boundedBy_sInfGen] refine OuterMeasure.boundedBy_caratheodory fun t => ?_ simp only [OuterMeasure.sInfGen, le_iInf_iff, forall_mem_image, measure_eq_iInf t, coe_toOuterMeasure] intro μ hμ u htu _hu have hm : ∀ {s t}, s ⊆ t → OuterMeasure.sInfGen (toOuterMeasure '' m) s ≤ μ t := by intro s t hst rw [OuterMeasure.sInfGen_def, iInf_image] exact iInf₂_le_of_le μ hμ <\| measure_mono hst rw [← measure_inter_add_diff u hs] exact add_le_add (hm <\| inter_subset_inter_left _ htu) (hm <\| diff_subset_diff_left htu) instance {_ : MeasurableSpace α} : InfSet (Measure α) := ⟨fun m => (sInf (toOuterMeasure '' m)).toMeasure <\| sInf_caratheodory⟩ theorem sInf_apply (hs : MeasurableSet s) : sInf m s = sInf (toOuterMeasure '' m) s := toMeasure_apply _ _ hs private theorem measure_sInf_le (h : μ ∈ m) : sInf m ≤ μ := have : sInf (toOuterMeasure '' m) ≤ μ.toOuterMeasure := sInf_le (mem_image_of_mem _ h) le_iff.2 fun s hs => by rw [sInf_apply hs]; exact this s private theorem measure_le_sInf (h : ∀ μ' ∈ m, μ ≤ μ') : μ ≤ sInf m := have : μ.toOuterMeasure ≤ sInf (toOuterMeasure '' m) := le_sInf <\| forall_mem_image.2 fun _ hμ ↦ toOuterMeasure_le.2 <\| h _ hμ le_iff.2 fun s hs => by rw [sInf_apply hs]; exact this s instance instCompleteSemilatticeInf {_ : MeasurableSpace α} : CompleteSemilatticeInf (Measure α) := { (by infer_instance : PartialOrder (Measure α)), (by infer_instance : InfSet (Measure α)) with sInf_le := fun _s _a => measure_sInf_le le_sInf := fun _s _a => measure_le_sInf } instance instCompleteLattice {_ : MeasurableSpace α} : CompleteLattice (Measure α) := { completeLatticeOfCompleteSemilatticeInf (Measure α) with top := { toOuterMeasure := ⊤, m_iUnion := by intro f _ _ refine (measure_iUnion_le _).antisymm ?_ if hne : (⋃ i, f i).Nonempty then rw [OuterMeasure.top_apply hne] exact le_top else simp_all [Set.not_nonempty_iff_eq_empty] trim_le := le_top }, le_top := fun _ => toOuterMeasure_le.mp le_top bot := 0 bot_le := fun _a _s => bot_le } end sInf lemma inf_apply {s : Set α} (hs : MeasurableSet s) : (μ ⊓ ν) s = sInf {m \| ∃ t, m = μ (t ∩ s) + ν (tᶜ ∩ s)} := by -- `(μ ⊓ ν) s` is defined as `⊓ (t : ℕ → Set α) (ht : s ⊆ ⋃ n, t n), ∑' n, μ (t n) ⊓ ν (t n)` rw [← sInf_pair, Measure.sInf_apply hs, OuterMeasure.sInf_apply (image_nonempty.2 <\| insert_nonempty μ {ν})] refine le_antisymm (le_sInf fun m ⟨t, ht₁⟩ ↦ ?_) (le_iInf₂ fun t' ht' ↦ ?_) · subst ht₁ -- We first show `(μ ⊓ ν) s ≤ μ (t ∩ s) + ν (tᶜ ∩ s)` for any `t : Set α` -- For this, define the sequence `t' : ℕ → Set α` where `t' 0 = t ∩ s`, `t' 1 = tᶜ ∩ s` and -- `∅` otherwise. Then, we have by construction -- `(μ ⊓ ν) s ≤ ∑' n, μ (t' n) ⊓ ν (t' n) ≤ μ (t' 0) + ν (t' 1) = μ (t ∩ s) + ν (tᶜ ∩ s)`. set t' : ℕ → Set α := fun n ↦ if n = 0 then t ∩ s else if n = 1 then tᶜ ∩ s else ∅ with ht' refine (iInf₂_le t' fun x hx ↦ ?_).trans ?_ · by_cases hxt : x ∈ t · refine mem_iUnion.2 ⟨0, ?_⟩ simp [hx, hxt] · refine mem_iUnion.2 ⟨1, ?_⟩ simp [hx, hxt] · simp only [iInf_image, coe_toOuterMeasure, iInf_pair] rw [tsum_eq_add_tsum_ite 0, tsum_eq_add_tsum_ite 1, if_neg zero_ne_one.symm, ENNReal.summable.tsum_eq_zero_iff.2 _, add_zero] · exact add_le_add (inf_le_left.trans <\| by simp [ht']) (inf_le_right.trans <\| by simp [ht']) · simp only [ite_eq_left_iff] intro n hn₁ hn₀ simp only [ht', if_neg hn₀, if_neg hn₁, measure_empty, iInf_pair, le_refl, inf_of_le_left] · simp only [iInf_image, coe_toOuterMeasure, iInf_pair] -- Conversely, fixing `t' : ℕ → Set α` such that `s ⊆ ⋃ n, t' n`, we construct `t : Set α` -- for which `μ (t ∩ s) + ν (tᶜ ∩ s) ≤ ∑' n, μ (t' n) ⊓ ν (t' n)`. -- Denoting `I := {n \| μ (t' n) ≤ ν (t' n)}`, we set `t = ⋃ n ∈ I, t' n`. -- Clearly `μ (t ∩ s) ≤ ∑' n ∈ I, μ (t' n)` and `ν (tᶜ ∩ s) ≤ ∑' n ∉ I, ν (t' n)`, so -- `μ (t ∩ s) + ν (tᶜ ∩ s) ≤ ∑' n ∈ I, μ (t' n) + ∑' n ∉ I, ν (t' n)` -- where the RHS equals `∑' n, μ (t' n) ⊓ ν (t' n)` by the choice of `I`. set t := ⋃ n ∈ {k : ℕ \| μ (t' k) ≤ ν (t' k)}, t' n with ht suffices hadd : μ (t ∩ s) + ν (tᶜ ∩ s) ≤ ∑' n, μ (t' n) ⊓ ν (t' n) by exact le_trans (sInf_le ⟨t, rfl⟩) hadd have hle₁ : μ (t ∩ s) ≤ ∑' (n : {k \| μ (t' k) ≤ ν (t' k)}), μ (t' n) := (measure_mono inter_subset_left).trans <\| measure_biUnion_le _ (to_countable _) _ have hcap : tᶜ ∩ s ⊆ ⋃ n ∈ {k \| ν (t' k) < μ (t' k)}, t' n := by simp_rw [ht, compl_iUnion] refine fun x ⟨hx₁, hx₂⟩ ↦ mem_iUnion₂.2 ?_ obtain ⟨i, hi⟩ := mem_iUnion.1 <\| ht' hx₂ refine ⟨i, ?_, hi⟩ by_contra h simp only [mem_setOf_eq, not_lt] at h exact mem_iInter₂.1 hx₁ i h hi have hle₂ : ν (tᶜ ∩ s) ≤ ∑' (n : {k \| ν (t' k) < μ (t' k)}), ν (t' n) := (measure_mono hcap).trans (measure_biUnion_le ν (to_countable {k \| ν (t' k) < μ (t' k)}) _) refine (add_le_add hle₁ hle₂).trans ?_ have heq : {k \| μ (t' k) ≤ ν (t' k)} ∪ {k \| ν (t' k) < μ (t' k)} = univ := by ext k; simp [le_or_lt] conv in ∑' (n : ℕ), μ (t' n) ⊓ ν (t' n) => rw [← tsum_univ, ← heq] rw [ENNReal.summable.tsum_union_disjoint (f := fun n ↦ μ (t' n) ⊓ ν (t' n)) ?_ ENNReal.summable] · refine add_le_add (tsum_congr ?_).le (tsum_congr ?_).le · rw [Subtype.forall] intro n hn; simpa · rw [Subtype.forall] intro n hn rw [mem_setOf_eq] at hn simp [le_of_lt hn] · rw [Set.disjoint_iff] rintro k ⟨hk₁, hk₂⟩ rw [mem_setOf_eq] at hk₁ hk₂ exact False.elim <\| hk₂.not_le hk₁ @[simp] theorem _root_.MeasureTheory.OuterMeasure.toMeasure_top : (⊤ : OuterMeasure α).toMeasure (by rw [OuterMeasure.top_caratheodory]; exact le_top) = (⊤ : Measure α) := toOuterMeasure_toMeasure (μ := ⊤) @[simp] theorem toOuterMeasure_top {_ : MeasurableSpace α} : (⊤ : Measure α).toOuterMeasure = (⊤ : OuterMeasure α) := rfl @[simp] theorem top_add : ⊤ + μ = ⊤ := top_unique <\| Measure.le_add_right le_rfl @[simp] theorem add_top : μ + ⊤ = ⊤ := top_unique <\| Measure.le_add_left le_rfl protected theorem zero_le {_m0 : MeasurableSpace α} (μ : Measure α) : 0 ≤ μ := bot_le theorem nonpos_iff_eq_zero' : μ ≤ 0 ↔ μ = 0 := μ.zero_le.le_iff_eq @[simp] theorem measure_univ_eq_zero : μ univ = 0 ↔ μ = 0 := ⟨fun h => bot_unique fun s => (h ▸ measure_mono (subset_univ s) : μ s ≤ 0), fun h => h.symm ▸ rfl⟩ theorem measure_univ_ne_zero : μ univ ≠ 0 ↔ μ ≠ 0 := measure_univ_eq_zero.not instance [NeZero μ] : NeZero (μ univ) := ⟨measure_univ_ne_zero.2 <\| NeZero.ne μ⟩ @[simp] theorem measure_univ_pos : 0 < μ univ ↔ μ ≠ 0 := pos_iff_ne_zero.trans measure_univ_ne_zero lemma nonempty_of_neZero (μ : Measure α) [NeZero μ] : Nonempty α := (isEmpty_or_nonempty α).resolve_left fun h ↦ by simpa [eq_empty_of_isEmpty] using NeZero.ne (μ univ) section Sum variable {f : ι → Measure α} /-- Sum of an indexed family of measures. -/ noncomputable def sum (f : ι → Measure α) : Measure α := (OuterMeasure.sum fun i => (f i).toOuterMeasure).toMeasure <\| le_trans (le_iInf fun _ => le_toOuterMeasure_caratheodory _) (OuterMeasure.le_sum_caratheodory _) theorem le_sum_apply (f : ι → Measure α) (s : Set α) : ∑' i, f i s ≤ sum f s := le_toMeasure_apply _ _ _ @[simp] theorem sum_apply (f : ι → Measure α) {s : Set α} (hs : MeasurableSet s) : sum f s = ∑' i, f i s := toMeasure_apply _ _ hs theorem sum_apply₀ (f : ι → Measure α) {s : Set α} (hs : NullMeasurableSet s (sum f)) : sum f s = ∑' i, f i s := by apply le_antisymm ?_ (le_sum_apply _ _) rcases hs.exists_measurable_subset_ae_eq with ⟨t, ts, t_meas, ht⟩ calc sum f s = sum f t := measure_congr ht.symm _ = ∑' i, f i t := sum_apply _ t_meas _ ≤ ∑' i, f i s := ENNReal.tsum_le_tsum fun i ↦ measure_mono ts /-! For the next theorem, the countability assumption is necessary. For a counterexample, consider an uncountable space, with a distinguished point `x₀`, and the sigma-algebra made of countable sets not containing `x₀`, and their complements. All points but `x₀` are measurable. Consider the sum of the Dirac masses at points different from `x₀`, and `s = {x₀}`. For any Dirac mass `δ_x`, we have `δ_x (x₀) = 0`, so `∑' x, δ_x (x₀) = 0`. On the other hand, the measure `sum δ_x` gives mass one to each point different from `x₀`, so it gives infinite mass to any measurable set containing `x₀` (as such a set is uncountable), and by outer regularity one gets `sum δ_x {x₀} = ∞`. -/ theorem sum_apply_of_countable [Countable ι] (f : ι → Measure α) (s : Set α) : sum f s = ∑' i, f i s := by apply le_antisymm ?_ (le_sum_apply _ _) rcases exists_measurable_superset_forall_eq f s with ⟨t, hst, htm, ht⟩ calc sum f s ≤ sum f t := measure_mono hst _ = ∑' i, f i t := sum_apply _ htm _ = ∑' i, f i s := by simp [ht] theorem le_sum (μ : ι → Measure α) (i : ι) : μ i ≤ sum μ := le_iff.2 fun s hs ↦ by simpa only [sum_apply μ hs] using ENNReal.le_tsum i @[simp] theorem sum_apply_eq_zero [Countable ι] {μ : ι → Measure α} {s : Set α} : sum μ s = 0 ↔ ∀ i, μ i s = 0 := by simp [sum_apply_of_countable] theorem sum_apply_eq_zero' {μ : ι → Measure α} {s : Set α} (hs : MeasurableSet s) : sum μ s = 0 ↔ ∀ i, μ i s = 0 := by simp [hs] @[simp] lemma sum_eq_zero : sum f = 0 ↔ ∀ i, f i = 0 := by simp +contextual [Measure.ext_iff, forall_swap (α := ι)] @[simp] lemma sum_zero : Measure.sum (fun (_ : ι) ↦ (0 : Measure α)) = 0 := by ext s hs simp [Measure.sum_apply _ hs] theorem sum_sum {ι' : Type} (μ : ι → ι' → Measure α) : (sum fun n => sum (μ n)) = sum (fun (p : ι × ι') ↦ μ p.1 p.2) := by ext1 s hs simp [sum_apply _ hs, ENNReal.tsum_prod'] theorem sum_comm {ι' : Type} (μ : ι → ι' → Measure α) : (sum fun n => sum (μ n)) = sum fun m => sum fun n => μ n m := by ext1 s hs simp_rw [sum_apply _ hs] rw [ENNReal.tsum_comm] theorem ae_sum_iff [Countable ι] {μ : ι → Measure α} {p : α → Prop} : (∀ᵐ x ∂sum μ, p x) ↔ ∀ i, ∀ᵐ x ∂μ i, p x := sum_apply_eq_zero theorem ae_sum_iff' {μ : ι → Measure α} {p : α → Prop} (h : MeasurableSet { x \| p x }) : (∀ᵐ x ∂sum μ, p x) ↔ ∀ i, ∀ᵐ x ∂μ i, p x := sum_apply_eq_zero' h.compl @[simp] theorem sum_fintype [Fintype ι] (μ : ι → Measure α) : sum μ = ∑ i, μ i := by ext1 s hs simp only [sum_apply, finset_sum_apply, hs, tsum_fintype] theorem sum_coe_finset (s : Finset ι) (μ : ι → Measure α) : (sum fun i : s => μ i) = ∑ i ∈ s, μ i := by rw [sum_fintype, Finset.sum_coe_sort s μ] @[simp] theorem ae_sum_eq [Countable ι] (μ : ι → Measure α) : ae (sum μ) = ⨆ i, ae (μ i) := Filter.ext fun _ => ae_sum_iff.trans mem_iSup.symm theorem sum_bool (f : Bool → Measure α) : sum f = f true + f false := by rw [sum_fintype, Fintype.sum_bool] theorem sum_cond (μ ν : Measure α) : (sum fun b => cond b μ ν) = μ + ν := sum_bool _ @[simp] theorem sum_of_isEmpty [IsEmpty ι] (μ : ι → Measure α) : sum μ = 0 := by rw [← measure_univ_eq_zero, sum_apply _ MeasurableSet.univ, tsum_empty] theorem sum_add_sum_compl (s : Set ι) (μ : ι → Measure α) : ((sum fun i : s => μ i) + sum fun i : ↥sᶜ => μ i) = sum μ := by ext1 t ht simp only [add_apply, sum_apply _ ht] exact ENNReal.summable.tsum_add_tsum_compl (f := fun i => μ i t) ENNReal.summable theorem sum_congr {μ ν : ℕ → Measure α} (h : ∀ n, μ n = ν n) : sum μ = sum ν := congr_arg sum (funext h) theorem sum_add_sum {ι : Type} (μ ν : ι → Measure α) : sum μ + sum ν = sum fun n => μ n + ν n := by ext1 s hs simp only [add_apply, sum_apply _ hs, Pi.add_apply, coe_add, ENNReal.summable.tsum_add ENNReal.summable] @[simp] lemma sum_comp_equiv {ι ι' : Type} (e : ι' ≃ ι) (m : ι → Measure α) : sum (m ∘ e) = sum m := by ext s hs simpa [hs, sum_apply] using e.tsum_eq (fun n ↦ m n s) @[simp] lemma sum_extend_zero {ι ι' : Type} {f : ι → ι'} (hf : Injective f) (m : ι → Measure α) : sum (Function.extend f m 0) = sum m := by ext s hs simp [*, Function.apply_extend (fun μ : Measure α ↦ μ s)] end Sum /-! ### The `cofinite` filter -/ /-- The filter of sets `s` such that `sᶜ` has finite measure. -/ def cofinite {m0 : MeasurableSpace α} (μ : Measure α) : Filter α := comk (μ · < ∞) (by simp) (fun _ ht _ hs ↦ (measure_mono hs).trans_lt ht) fun s hs t ht ↦ (measure_union_le s t).trans_lt <\| ENNReal.add_lt_top.2 ⟨hs, ht⟩ theorem mem_cofinite : s ∈ μ.cofinite ↔ μ sᶜ < ∞ := Iff.rfl theorem compl_mem_cofinite : sᶜ ∈ μ.cofinite ↔ μ s < ∞ := by rw [mem_cofinite, compl_compl] theorem eventually_cofinite {p : α → Prop} : (∀ᶠ x in μ.cofinite, p x) ↔ μ { x \| ¬p x } < ∞ := Iff.rfl instance cofinite.instIsMeasurablyGenerated : IsMeasurablyGenerated μ.cofinite where exists_measurable_subset s hs := by refine ⟨(toMeasurable μ sᶜ)ᶜ, ?_, (measurableSet_toMeasurable _ _).compl, ?_⟩ · rwa [compl_mem_cofinite, measure_toMeasurable] · rw [compl_subset_comm] apply subset_toMeasurable end Measure open Measure open MeasureTheory protected theorem _root_.AEMeasurable.nullMeasurable {f : α → β} (h : AEMeasurable f μ) : NullMeasurable f μ := let ⟨_g, hgm, hg⟩ := h; hgm.nullMeasurable.congr hg.symm lemma _root_.AEMeasurable.nullMeasurableSet_preimage {f : α → β} {s : Set β} (hf : AEMeasurable f μ) (hs : MeasurableSet s) : NullMeasurableSet (f ⁻¹' s) μ := hf.nullMeasurable hs @[simp] theorem ae_eq_bot : ae μ = ⊥ ↔ μ = 0 := by rw [← empty_mem_iff_bot, mem_ae_iff, compl_empty, measure_univ_eq_zero] @[simp] theorem ae_neBot : (ae μ).NeBot ↔ μ ≠ 0 := neBot_iff.trans (not_congr ae_eq_bot) instance Measure.ae.neBot [NeZero μ] : (ae μ).NeBot := ae_neBot.2 <\| NeZero.ne μ @[simp] theorem ae_zero {_m0 : MeasurableSpace α} : ae (0 : Measure α) = ⊥ := ae_eq_bot.2 rfl section Intervals theorem biSup_measure_Iic [Preorder α] {s : Set α} (hsc : s.Countable) (hst : ∀ x : α, ∃ y ∈ s, x ≤ y) (hdir : DirectedOn (· ≤ ·) s) : ⨆ x ∈ s, μ (Iic x) = μ univ := by rw [← measure_biUnion_eq_iSup hsc] · congr simp only [← bex_def] at hst exact iUnion₂_eq_univ_iff.2 hst · exact directedOn_iff_directed.2 (hdir.directed_val.mono_comp _ fun x y => Iic_subset_Iic.2) theorem tendsto_measure_Ico_atTop [Preorder α] [NoMaxOrder α] [(atTop : Filter α).IsCountablyGenerated] (μ : Measure α) (a : α) : Tendsto (fun x => μ (Ico a x)) atTop (𝓝 (μ (Ici a))) := by rw [← iUnion_Ico_right] exact tendsto_measure_iUnion_atTop (antitone_const.Ico monotone_id) theorem tendsto_measure_Ioc_atBot [Preorder α] [NoMinOrder α] [(atBot : Filter α).IsCountablyGenerated] (μ : Measure α) (a : α) : Tendsto (fun x => μ (Ioc x a)) atBot (𝓝 (μ (Iic a))) := by rw [← iUnion_Ioc_left] exact tendsto_measure_iUnion_atBot (monotone_id.Ioc antitone_const) theorem tendsto_measure_Iic_atTop [Preorder α] [(atTop : Filter α).IsCountablyGenerated] (μ : Measure α) : Tendsto (fun x => μ (Iic x)) atTop (𝓝 (μ univ)) := by rw [← iUnion_Iic] exact tendsto_measure_iUnion_atTop monotone_Iic theorem tendsto_measure_Ici_atBot [Preorder α] [(atBot : Filter α).IsCountablyGenerated] (μ : Measure α) : Tendsto (fun x => μ (Ici x)) atBot (𝓝 (μ univ)) := tendsto_measure_Iic_atTop (α := αᵒᵈ) μ variable [PartialOrder α] {a b : α} theorem Iio_ae_eq_Iic' (ha : μ {a} = 0) : Iio a =ᵐ[μ] Iic a := by rw [← Iic_diff_right, diff_ae_eq_self, measure_mono_null Set.inter_subset_right ha] theorem Ioi_ae_eq_Ici' (ha : μ {a} = 0) : Ioi a =ᵐ[μ] Ici a := Iio_ae_eq_Iic' (α := αᵒᵈ) ha theorem Ioo_ae_eq_Ioc' (hb : μ {b} = 0) : Ioo a b =ᵐ[μ] Ioc a b := (ae_eq_refl _).inter (Iio_ae_eq_Iic' hb) theorem Ioc_ae_eq_Icc' (ha : μ {a} = 0) : Ioc a b =ᵐ[μ] Icc a b := (Ioi_ae_eq_Ici' ha).inter (ae_eq_refl _) theorem Ioo_ae_eq_Ico' (ha : μ {a} = 0) : Ioo a b =ᵐ[μ] Ico a b := (Ioi_ae_eq_Ici' ha).inter (ae_eq_refl _) theorem Ioo_ae_eq_Icc' (ha : μ {a} = 0) (hb : μ {b} = 0) : Ioo a b =ᵐ[μ] Icc a b := (Ioi_ae_eq_Ici' ha).inter (Iio_ae_eq_Iic' hb) theorem Ico_ae_eq_Icc' (hb : μ {b} = 0) : Ico a b =ᵐ[μ] Icc a b :=	(ae_eq_refl _).inter (Iio_ae_eq_Iic' hb) theorem Ico_ae_eq_Ioc' (ha : μ {a} = 0) (hb : μ {b} = 0) : Ico a b =ᵐ[μ] Ioc a b := (Ioo_ae_eq_Ico' ha).symm.trans (Ioo_ae_eq_Ioc' hb)	Mathlib/MeasureTheory/Measure/MeasureSpace.lean	1,371	1,375
/- Copyright (c) 2022 Michael Stoll. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Michael Stoll, Thomas Zhu, Mario Carneiro -/ import Mathlib.NumberTheory.LegendreSymbol.QuadraticReciprocity /-! # The Jacobi Symbol We define the Jacobi symbol and prove its main properties. ## Main definitions We define the Jacobi symbol, `jacobiSym a b`, for integers `a` and natural numbers `b` as the product over the prime factors `p` of `b` of the Legendre symbols `legendreSym p a`. This agrees with the mathematical definition when `b` is odd. The prime factors are obtained via `Nat.factors`. Since `Nat.factors 0 = []`, this implies in particular that `jacobiSym a 0 = 1` for all `a`. ## Main statements We prove the main properties of the Jacobi symbol, including the following. * Multiplicativity in both arguments (`jacobiSym.mul_left`, `jacobiSym.mul_right`) * The value of the symbol is `1` or `-1` when the arguments are coprime (`jacobiSym.eq_one_or_neg_one`) * The symbol vanishes if and only if `b ≠ 0` and the arguments are not coprime (`jacobiSym.eq_zero_iff_not_coprime`) * If the symbol has the value `-1`, then `a : ZMod b` is not a square (`ZMod.nonsquare_of_jacobiSym_eq_neg_one`); the converse holds when `b = p` is a prime (`ZMod.nonsquare_iff_jacobiSym_eq_neg_one`); in particular, in this case `a` is a square mod `p` when the symbol has the value `1` (`ZMod.isSquare_of_jacobiSym_eq_one`). * Quadratic reciprocity (`jacobiSym.quadratic_reciprocity`, `jacobiSym.quadratic_reciprocity_one_mod_four`, `jacobiSym.quadratic_reciprocity_three_mod_four`) * The supplementary laws for `a = -1`, `a = 2`, `a = -2` (`jacobiSym.at_neg_one`, `jacobiSym.at_two`, `jacobiSym.at_neg_two`) * The symbol depends on `a` only via its residue class mod `b` (`jacobiSym.mod_left`) and on `b` only via its residue class mod `4a` (`jacobiSym.mod_right`) A `csimp` rule for `jacobiSym` and `legendreSym` that evaluates `J(a \| b)` efficiently by reducing to the case `0 ≤ a < b` and `a`, `b` odd, and then swaps `a`, `b` and recurses using quadratic reciprocity. ## Notations We define the notation `J(a \| b)` for `jacobiSym a b`, localized to `NumberTheorySymbols`. ## Tags Jacobi symbol, quadratic reciprocity -/ section Jacobi /-! ### Definition of the Jacobi symbol We define the Jacobi symbol $\Bigl(\frac{a}{b}\Bigr)$ for integers `a` and natural numbers `b` as the product of the Legendre symbols $\Bigl(\frac{a}{p}\Bigr)$, where `p` runs through the prime divisors (with multiplicity) of `b`, as provided by `b.factors`. This agrees with the Jacobi symbol when `b` is odd and gives less meaningful values when it is not (e.g., the symbol is `1` when `b = 0`). This is called `jacobiSym a b`. We define localized notation (locale `NumberTheorySymbols`) `J(a \| b)` for the Jacobi symbol `jacobiSym a b`. -/ open Nat ZMod -- Since we need the fact that the factors are prime, we use `List.pmap`. /-- The Jacobi symbol of `a` and `b` -/ def jacobiSym (a : ℤ) (b : ℕ) : ℤ := (b.primeFactorsList.pmap (fun p pp => @legendreSym p ⟨pp⟩ a) fun _ pf => prime_of_mem_primeFactorsList pf).prod -- Notation for the Jacobi symbol. @[inherit_doc] scoped[NumberTheorySymbols] notation "J(" a " \| " b ")" => jacobiSym a b open NumberTheorySymbols /-! ### Properties of the Jacobi symbol -/ namespace jacobiSym /-- The symbol `J(a \| 0)` has the value `1`. -/ @[simp] theorem zero_right (a : ℤ) : J(a \| 0) = 1 := by simp only [jacobiSym, primeFactorsList_zero, List.prod_nil, List.pmap] /-- The symbol `J(a \| 1)` has the value `1`. -/ @[simp] theorem one_right (a : ℤ) : J(a \| 1) = 1 := by simp only [jacobiSym, primeFactorsList_one, List.prod_nil, List.pmap] /-- The Legendre symbol `legendreSym p a` with an integer `a` and a prime number `p` is the same as the Jacobi symbol `J(a \| p)`. -/ theorem legendreSym.to_jacobiSym (p : ℕ) [fp : Fact p.Prime] (a : ℤ) : legendreSym p a = J(a \| p) := by simp only [jacobiSym, primeFactorsList_prime fp.1, List.prod_cons, List.prod_nil, mul_one, List.pmap] /-- The Jacobi symbol is multiplicative in its second argument. -/ theorem mul_right' (a : ℤ) {b₁ b₂ : ℕ} (hb₁ : b₁ ≠ 0) (hb₂ : b₂ ≠ 0) : J(a \| b₁ * b₂) = J(a \| b₁) * J(a \| b₂) := by rw [jacobiSym, ((perm_primeFactorsList_mul hb₁ hb₂).pmap _).prod_eq, List.pmap_append, List.prod_append] pick_goal 2 · exact fun p hp => (List.mem_append.mp hp).elim prime_of_mem_primeFactorsList prime_of_mem_primeFactorsList · rfl /-- The Jacobi symbol is multiplicative in its second argument. -/ theorem mul_right (a : ℤ) (b₁ b₂ : ℕ) [NeZero b₁] [NeZero b₂] : J(a \| b₁ * b₂) = J(a \| b₁) * J(a \| b₂) := mul_right' a (NeZero.ne b₁) (NeZero.ne b₂) /-- The Jacobi symbol takes only the values `0`, `1` and `-1`. -/ theorem trichotomy (a : ℤ) (b : ℕ) : J(a \| b) = 0 ∨ J(a \| b) = 1 ∨ J(a \| b) = -1 := ((MonoidHom.mrange (@SignType.castHom ℤ _ _).toMonoidHom).copy {0, 1, -1} <\| by rw [Set.pair_comm] exact (SignType.range_eq SignType.castHom).symm).list_prod_mem (by intro _ ha' rcases List.mem_pmap.mp ha' with ⟨p, hp, rfl⟩ haveI : Fact p.Prime := ⟨prime_of_mem_primeFactorsList hp⟩ exact quadraticChar_isQuadratic (ZMod p) a) /-- The symbol `J(1 \| b)` has the value `1`. -/ @[simp] theorem one_left (b : ℕ) : J(1 \| b) = 1 := List.prod_eq_one fun z hz => by let ⟨p, hp, he⟩ := List.mem_pmap.1 hz rw [← he, legendreSym.at_one]	/-- The Jacobi symbol is multiplicative in its first argument. -/ theorem mul_left (a₁ a₂ : ℤ) (b : ℕ) : J(a₁ * a₂ \| b) = J(a₁ \| b) * J(a₂ \| b) := by simp_rw [jacobiSym, List.pmap_eq_map_attach, legendreSym.mul _ _ _] exact List.prod_map_mul (α := ℤ) (l := (primeFactorsList b).attach) (f := fun x ↦ @legendreSym x {out := prime_of_mem_primeFactorsList x.2} a₁) (g := fun x ↦ @legendreSym x {out := prime_of_mem_primeFactorsList x.2} a₂)	Mathlib/NumberTheory/LegendreSymbol/JacobiSymbol.lean	149	155
/- Copyright (c) 2023 Heather Macbeth. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Heather Macbeth, Floris van Doorn -/ import Mathlib.Geometry.Manifold.Algebra.LieGroup import Mathlib.Geometry.Manifold.MFDeriv.Basic import Mathlib.Topology.ContinuousMap.Basic import Mathlib.Geometry.Manifold.VectorBundle.Basic /-! # `C^n` sections In this file we define the type `ContMDiffSection` of `n` times continuously differentiable sections of a vector bundle over a manifold `M` and prove that it's a module. -/ open Bundle Filter Function open scoped Bundle Manifold ContDiff variable {𝕜 : Type} [NontriviallyNormedField 𝕜] {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {H : Type} [TopologicalSpace H] (I : ModelWithCorners 𝕜 E H) {M : Type} [TopologicalSpace M] [ChartedSpace H M] variable (F : Type) [NormedAddCommGroup F] [NormedSpace 𝕜 F] -- `F` model fiber (n : WithTop ℕ∞) (V : M → Type) [TopologicalSpace (TotalSpace F V)] -- `V` vector bundle [∀ x : M, TopologicalSpace (V x)] [FiberBundle F V] /-- Bundled `n` times continuously differentiable sections of a vector bundle. Denoted as `Cₛ^n⟮I; F, V⟯` within the `Manifold` namespace. -/ structure ContMDiffSection where /-- the underlying function of this section -/ protected toFun : ∀ x, V x /-- proof that this section is `C^n` -/ protected contMDiff_toFun : ContMDiff I (I.prod 𝓘(𝕜, F)) n fun x ↦ TotalSpace.mk' F x (toFun x) @[deprecated (since := "2024-11-21")] alias SmoothSection := ContMDiffSection @[inherit_doc] scoped[Manifold] notation "Cₛ^" n "⟮" I "; " F ", " V "⟯" => ContMDiffSection I F n V namespace ContMDiffSection variable {I} {n} {F} {V} instance : DFunLike Cₛ^n⟮I; F, V⟯ M V where coe := ContMDiffSection.toFun coe_injective' := by rintro ⟨⟩ ⟨⟩ h; congr variable {s t : Cₛ^n⟮I; F, V⟯} @[simp] theorem coeFn_mk (s : ∀ x, V x) (hs : ContMDiff I (I.prod 𝓘(𝕜, F)) n fun x => TotalSpace.mk x (s x)) : (mk s hs : ∀ x, V x) = s := rfl protected theorem contMDiff (s : Cₛ^n⟮I; F, V⟯) : ContMDiff I (I.prod 𝓘(𝕜, F)) n fun x => TotalSpace.mk' F x (s x : V x) := s.contMDiff_toFun @[deprecated (since := "2024-11-21")] alias smooth := ContMDiffSection.contMDiff theorem coe_inj ⦃s t : Cₛ^n⟮I; F, V⟯⦄ (h : (s : ∀ x, V x) = t) : s = t := DFunLike.ext' h theorem coe_injective : Injective ((↑) : Cₛ^n⟮I; F, V⟯ → ∀ x, V x) := coe_inj @[ext] theorem ext (h : ∀ x, s x = t x) : s = t := DFunLike.ext _ _ h section variable [∀ x, AddCommGroup (V x)] [∀ x, Module 𝕜 (V x)] [VectorBundle 𝕜 F V] instance instAdd : Add Cₛ^n⟮I; F, V⟯ := by refine ⟨fun s t => ⟨s + t, ?_⟩⟩ intro x₀ have hs := s.contMDiff x₀ have ht := t.contMDiff x₀ rw [contMDiffAt_section] at hs ht ⊢ set e := trivializationAt F V x₀ refine (hs.add ht).congr_of_eventuallyEq ?_ refine eventually_of_mem (e.open_baseSet.mem_nhds <\| mem_baseSet_trivializationAt F V x₀) ?_ intro x hx apply (e.linear 𝕜 hx).1 @[simp] theorem coe_add (s t : Cₛ^n⟮I; F, V⟯) : ⇑(s + t) = ⇑s + t := rfl instance instSub : Sub Cₛ^n⟮I; F, V⟯ := by refine ⟨fun s t => ⟨s - t, ?_⟩⟩ intro x₀ have hs := s.contMDiff x₀ have ht := t.contMDiff x₀ rw [contMDiffAt_section] at hs ht ⊢ set e := trivializationAt F V x₀ refine (hs.sub ht).congr_of_eventuallyEq ?_ refine eventually_of_mem (e.open_baseSet.mem_nhds <\| mem_baseSet_trivializationAt F V x₀) ?_ intro x hx apply (e.linear 𝕜 hx).map_sub @[simp] theorem coe_sub (s t : Cₛ^n⟮I; F, V⟯) : ⇑(s - t) = s - t := rfl instance instZero : Zero Cₛ^n⟮I; F, V⟯ := ⟨⟨fun _ => 0, (contMDiff_zeroSection 𝕜 V).of_le le_top⟩⟩ instance inhabited : Inhabited Cₛ^n⟮I; F, V⟯ := ⟨0⟩ @[simp] theorem coe_zero : ⇑(0 : Cₛ^n⟮I; F, V⟯) = 0 := rfl instance instNeg : Neg Cₛ^n⟮I; F, V⟯ := by refine ⟨fun s => ⟨-s, ?_⟩⟩ intro x₀ have hs := s.contMDiff x₀ rw [contMDiffAt_section] at hs ⊢ set e := trivializationAt F V x₀ refine hs.neg.congr_of_eventuallyEq ?_ refine eventually_of_mem (e.open_baseSet.mem_nhds <\| mem_baseSet_trivializationAt F V x₀) ?_ intro x hx apply (e.linear 𝕜 hx).map_neg @[simp] theorem coe_neg (s : Cₛ^n⟮I; F, V⟯) : ⇑(-s : Cₛ^n⟮I; F, V⟯) = -s := rfl instance instNSMul : SMul ℕ Cₛ^n⟮I; F, V⟯ := ⟨nsmulRec⟩ @[simp] theorem coe_nsmul (s : Cₛ^n⟮I; F, V⟯) (k : ℕ) : ⇑(k • s : Cₛ^n⟮I; F, V⟯) = k • ⇑s := by induction' k with k ih · simp_rw [zero_smul]; rfl simp_rw [succ_nsmul, ← ih]; rfl instance instZSMul : SMul ℤ Cₛ^n⟮I; F, V⟯ := ⟨zsmulRec⟩ @[simp] theorem coe_zsmul (s : Cₛ^n⟮I; F, V⟯) (z : ℤ) : ⇑(z • s : Cₛ^n⟮I; F, V⟯) = z • ⇑s := by rcases z with n \| n · refine (coe_nsmul s n).trans ?_ simp only [Int.ofNat_eq_coe, natCast_zsmul] · refine (congr_arg Neg.neg (coe_nsmul s (n + 1))).trans ?_ simp only [negSucc_zsmul, neg_inj] instance instAddCommGroup : AddCommGroup Cₛ^n⟮I; F, V⟯ := coe_injective.addCommGroup _ coe_zero coe_add coe_neg coe_sub coe_nsmul coe_zsmul instance instSMul : SMul 𝕜 Cₛ^n⟮I; F, V⟯ := by refine ⟨fun c s => ⟨c • ⇑s, ?_⟩⟩ intro x₀ have hs := s.contMDiff x₀ rw [contMDiffAt_section] at hs ⊢ set e := trivializationAt F V x₀ refine ((contMDiffAt_const (c := c)).smul hs).congr_of_eventuallyEq ?_ refine eventually_of_mem (e.open_baseSet.mem_nhds <\| mem_baseSet_trivializationAt F V x₀) ?_ intro x hx apply (e.linear 𝕜 hx).2 @[simp] theorem coe_smul (r : 𝕜) (s : Cₛ^n⟮I; F, V⟯) : ⇑(r • s : Cₛ^n⟮I; F, V⟯) = r • ⇑s := rfl variable (I F V n) in /-- The additive morphism from `C^n` sections to dependent maps. -/ def coeAddHom : Cₛ^n⟮I; F, V⟯ →+ ∀ x, V x where toFun := (↑) map_zero' := coe_zero map_add' := coe_add @[simp] theorem coeAddHom_apply (s : Cₛ^n⟮I; F, V⟯) : coeAddHom I F n V s = s := rfl instance instModule : Module 𝕜 Cₛ^n⟮I; F, V⟯ := coe_injective.module 𝕜 (coeAddHom I F n V) coe_smul end protected theorem mdifferentiable' (s : Cₛ^n⟮I; F, V⟯) (hn : 1 ≤ n) : MDifferentiable I (I.prod 𝓘(𝕜, F)) fun x => TotalSpace.mk' F x (s x : V x) := s.contMDiff.mdifferentiable hn protected theorem mdifferentiable (s : Cₛ^∞⟮I; F, V⟯) : MDifferentiable I (I.prod 𝓘(𝕜, F)) fun x => TotalSpace.mk' F x (s x : V x) := s.contMDiff.mdifferentiable (mod_cast le_top) protected theorem mdifferentiableAt (s : Cₛ^∞⟮I; F, V⟯) {x} : MDifferentiableAt I (I.prod 𝓘(𝕜, F)) (fun x => TotalSpace.mk' F x (s x : V x)) x := s.mdifferentiable x end ContMDiffSection		Mathlib/Geometry/Manifold/VectorBundle/SmoothSection.lean	212	217
/- 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 -/ import Mathlib.Data.Finset.Basic import Mathlib.Data.Finset.Image /-! # Cardinality of a finite set This defines the cardinality of a `Finset` and provides induction principles for finsets. ## Main declarations * `Finset.card`: `#s : ℕ` returns the cardinality of `s : Finset α`. ### Induction principles * `Finset.strongInduction`: Strong induction * `Finset.strongInductionOn` * `Finset.strongDownwardInduction` * `Finset.strongDownwardInductionOn` * `Finset.case_strong_induction_on` * `Finset.Nonempty.strong_induction` -/ assert_not_exists Monoid open Function Multiset Nat variable {α β R : Type} namespace Finset variable {s t : Finset α} {a b : α} /-- `s.card` is the number of elements of `s`, aka its cardinality. The notation `#s` can be accessed in the `Finset` locale. -/ def card (s : Finset α) : ℕ := Multiset.card s.1 @[inherit_doc] scoped prefix:arg "#" => Finset.card theorem card_def (s : Finset α) : #s = Multiset.card s.1 := rfl @[simp] lemma card_val (s : Finset α) : Multiset.card s.1 = #s := rfl @[simp] theorem card_mk {m nodup} : #(⟨m, nodup⟩ : Finset α) = Multiset.card m := rfl @[simp] theorem card_empty : #(∅ : Finset α) = 0 := rfl @[gcongr] theorem card_le_card : s ⊆ t → #s ≤ #t := Multiset.card_le_card ∘ val_le_iff.mpr @[mono] theorem card_mono : Monotone (@card α) := by apply card_le_card @[simp] lemma card_eq_zero : #s = 0 ↔ s = ∅ := Multiset.card_eq_zero.trans val_eq_zero lemma card_ne_zero : #s ≠ 0 ↔ s.Nonempty := card_eq_zero.ne.trans nonempty_iff_ne_empty.symm @[simp] lemma card_pos : 0 < #s ↔ s.Nonempty := Nat.pos_iff_ne_zero.trans card_ne_zero @[simp] lemma one_le_card : 1 ≤ #s ↔ s.Nonempty := card_pos alias ⟨_, Nonempty.card_pos⟩ := card_pos alias ⟨_, Nonempty.card_ne_zero⟩ := card_ne_zero theorem card_ne_zero_of_mem (h : a ∈ s) : #s ≠ 0 := (not_congr card_eq_zero).2 <\| ne_empty_of_mem h @[simp] theorem card_singleton (a : α) : #{a} = 1 := Multiset.card_singleton _ theorem card_singleton_inter [DecidableEq α] : #({a} ∩ s) ≤ 1 := by obtain h \| h := Finset.decidableMem a s · simp [Finset.singleton_inter_of_not_mem h] · simp [Finset.singleton_inter_of_mem h] @[simp] theorem card_cons (h : a ∉ s) : #(s.cons a h) = #s + 1 := Multiset.card_cons _ _ section InsertErase variable [DecidableEq α] @[simp] theorem card_insert_of_not_mem (h : a ∉ s) : #(insert a s) = #s + 1 := by rw [← cons_eq_insert _ _ h, card_cons] theorem card_insert_of_mem (h : a ∈ s) : #(insert a s) = #s := by rw [insert_eq_of_mem h] theorem card_insert_le (a : α) (s : Finset α) : #(insert a s) ≤ #s + 1 := by by_cases h : a ∈ s · rw [insert_eq_of_mem h] exact Nat.le_succ _ · rw [card_insert_of_not_mem h] section variable {a b c d e f : α} theorem card_le_two : #{a, b} ≤ 2 := card_insert_le _ _ theorem card_le_three : #{a, b, c} ≤ 3 := (card_insert_le _ _).trans (Nat.succ_le_succ card_le_two) theorem card_le_four : #{a, b, c, d} ≤ 4 := (card_insert_le _ _).trans (Nat.succ_le_succ card_le_three) theorem card_le_five : #{a, b, c, d, e} ≤ 5 := (card_insert_le _ _).trans (Nat.succ_le_succ card_le_four) theorem card_le_six : #{a, b, c, d, e, f} ≤ 6 := (card_insert_le _ _).trans (Nat.succ_le_succ card_le_five) end /-- If `a ∈ s` is known, see also `Finset.card_insert_of_mem` and `Finset.card_insert_of_not_mem`. -/ theorem card_insert_eq_ite : #(insert a s) = if a ∈ s then #s else #s + 1 := by by_cases h : a ∈ s · rw [card_insert_of_mem h, if_pos h] · rw [card_insert_of_not_mem h, if_neg h] @[simp] theorem card_pair_eq_one_or_two : #{a, b} = 1 ∨ #{a, b} = 2 := by simp [card_insert_eq_ite] tauto @[simp] theorem card_pair (h : a ≠ b) : #{a, b} = 2 := by rw [card_insert_of_not_mem (not_mem_singleton.2 h), card_singleton] /-- $\#(s \setminus \{a\}) = \#s - 1$ if $a \in s$. -/ @[simp] theorem card_erase_of_mem : a ∈ s → #(s.erase a) = #s - 1 := Multiset.card_erase_of_mem @[simp] theorem card_erase_add_one : a ∈ s → #(s.erase a) + 1 = #s := Multiset.card_erase_add_one theorem card_erase_lt_of_mem : a ∈ s → #(s.erase a) < #s := Multiset.card_erase_lt_of_mem theorem card_erase_le : #(s.erase a) ≤ #s := Multiset.card_erase_le theorem pred_card_le_card_erase : #s - 1 ≤ #(s.erase a) := by by_cases h : a ∈ s · exact (card_erase_of_mem h).ge · rw [erase_eq_of_not_mem h] exact Nat.sub_le _ _ /-- If `a ∈ s` is known, see also `Finset.card_erase_of_mem` and `Finset.erase_eq_of_not_mem`. -/ theorem card_erase_eq_ite : #(s.erase a) = if a ∈ s then #s - 1 else #s := Multiset.card_erase_eq_ite end InsertErase @[simp] theorem card_range (n : ℕ) : #(range n) = n := Multiset.card_range n @[simp] theorem card_attach : #s.attach = #s := Multiset.card_attach end Finset open scoped Finset section ToMLListultiset variable [DecidableEq α] (m : Multiset α) (l : List α) theorem Multiset.card_toFinset : #m.toFinset = Multiset.card m.dedup := rfl theorem Multiset.toFinset_card_le : #m.toFinset ≤ Multiset.card m := card_le_card <\| dedup_le _ theorem Multiset.toFinset_card_of_nodup {m : Multiset α} (h : m.Nodup) : #m.toFinset = Multiset.card m := congr_arg card <\| Multiset.dedup_eq_self.mpr h theorem Multiset.dedup_card_eq_card_iff_nodup {m : Multiset α} : card m.dedup = card m ↔ m.Nodup := .trans ⟨fun h ↦ eq_of_le_of_card_le (dedup_le m) h.ge, congr_arg _⟩ dedup_eq_self theorem Multiset.toFinset_card_eq_card_iff_nodup {m : Multiset α} : #m.toFinset = card m ↔ m.Nodup := dedup_card_eq_card_iff_nodup theorem List.card_toFinset : #l.toFinset = l.dedup.length := rfl theorem List.toFinset_card_le : #l.toFinset ≤ l.length := Multiset.toFinset_card_le ⟦l⟧ theorem List.toFinset_card_of_nodup {l : List α} (h : l.Nodup) : #l.toFinset = l.length := Multiset.toFinset_card_of_nodup h end ToMLListultiset namespace Finset variable {s t u : Finset α} {f : α → β} {n : ℕ} @[simp] theorem length_toList (s : Finset α) : s.toList.length = #s := by rw [toList, ← Multiset.coe_card, Multiset.coe_toList, card_def] theorem card_image_le [DecidableEq β] : #(s.image f) ≤ #s := by simpa only [card_map] using (s.1.map f).toFinset_card_le theorem card_image_of_injOn [DecidableEq β] (H : Set.InjOn f s) : #(s.image f) = #s := by simp only [card, image_val_of_injOn H, card_map] theorem injOn_of_card_image_eq [DecidableEq β] (H : #(s.image f) = #s) : Set.InjOn f s := by rw [card_def, card_def, image, toFinset] at H dsimp only at H have : (s.1.map f).dedup = s.1.map f := by refine Multiset.eq_of_le_of_card_le (Multiset.dedup_le _) ?_ simp only [H, Multiset.card_map, le_rfl] rw [Multiset.dedup_eq_self] at this exact inj_on_of_nodup_map this theorem card_image_iff [DecidableEq β] : #(s.image f) = #s ↔ Set.InjOn f s := ⟨injOn_of_card_image_eq, card_image_of_injOn⟩ theorem card_image_of_injective [DecidableEq β] (s : Finset α) (H : Injective f) : #(s.image f) = #s := card_image_of_injOn fun _ _ _ _ h => H h theorem fiber_card_ne_zero_iff_mem_image (s : Finset α) (f : α → β) [DecidableEq β] (y : β) : #(s.filter fun x ↦ f x = y) ≠ 0 ↔ y ∈ s.image f := by rw [← Nat.pos_iff_ne_zero, card_pos, fiber_nonempty_iff_mem_image] lemma card_filter_le_iff (s : Finset α) (P : α → Prop) [DecidablePred P] (n : ℕ) : #(s.filter P) ≤ n ↔ ∀ s' ⊆ s, n < #s' → ∃ a ∈ s', ¬ P a := (s.1.card_filter_le_iff P n).trans ⟨fun H s' hs' h ↦ H s'.1 (by aesop) h, fun H s' hs' h ↦ H ⟨s', nodup_of_le hs' s.2⟩ (fun _ hx ↦ Multiset.subset_of_le hs' hx) h⟩ @[simp] theorem card_map (f : α ↪ β) : #(s.map f) = #s := Multiset.card_map _ _ @[simp] theorem card_subtype (p : α → Prop) [DecidablePred p] (s : Finset α) : #(s.subtype p) = #(s.filter p) := by simp [Finset.subtype] theorem card_filter_le (s : Finset α) (p : α → Prop) [DecidablePred p] : #(s.filter p) ≤ #s := card_le_card <\| filter_subset _ _ theorem eq_of_subset_of_card_le {s t : Finset α} (h : s ⊆ t) (h₂ : #t ≤ #s) : s = t := eq_of_veq <\| Multiset.eq_of_le_of_card_le (val_le_iff.mpr h) h₂ theorem eq_iff_card_le_of_subset (hst : s ⊆ t) : #t ≤ #s ↔ s = t := ⟨eq_of_subset_of_card_le hst, (ge_of_eq <\| congr_arg _ ·)⟩ theorem eq_of_superset_of_card_ge (hst : s ⊆ t) (hts : #t ≤ #s) : t = s := (eq_of_subset_of_card_le hst hts).symm theorem eq_iff_card_ge_of_superset (hst : s ⊆ t) : #t ≤ #s ↔ t = s := (eq_iff_card_le_of_subset hst).trans eq_comm theorem subset_iff_eq_of_card_le (h : #t ≤ #s) : s ⊆ t ↔ s = t := ⟨fun hst => eq_of_subset_of_card_le hst h, Eq.subset'⟩ theorem map_eq_of_subset {f : α ↪ α} (hs : s.map f ⊆ s) : s.map f = s := eq_of_subset_of_card_le hs (card_map _).ge theorem card_filter_eq_iff {p : α → Prop} [DecidablePred p] : #(s.filter p) = #s ↔ ∀ x ∈ s, p x := by rw [(card_filter_le s p).eq_iff_not_lt, not_lt, eq_iff_card_le_of_subset (filter_subset p s), filter_eq_self] alias ⟨filter_card_eq, _⟩ := card_filter_eq_iff theorem card_filter_eq_zero_iff {p : α → Prop} [DecidablePred p] : #(s.filter p) = 0 ↔ ∀ x ∈ s, ¬ p x := by rw [card_eq_zero, filter_eq_empty_iff] nonrec lemma card_lt_card (h : s ⊂ t) : #s < #t := card_lt_card <\| val_lt_iff.2 h lemma card_strictMono : StrictMono (card : Finset α → ℕ) := fun _ _ ↦ card_lt_card theorem card_eq_of_bijective (f : ∀ i, i < n → α) (hf : ∀ a ∈ s, ∃ i, ∃ h : i < n, f i h = a) (hf' : ∀ i (h : i < n), f i h ∈ s) (f_inj : ∀ i j (hi : i < n) (hj : j < n), f i hi = f j hj → i = j) : #s = n := by classical have : s = (range n).attach.image fun i => f i.1 (mem_range.1 i.2) := by ext a suffices _ : a ∈ s ↔ ∃ (i : _) (hi : i ∈ range n), f i (mem_range.1 hi) = a by simpa only [mem_image, mem_attach, true_and, Subtype.exists] constructor · intro ha; obtain ⟨i, hi, rfl⟩ := hf a ha; use i, mem_range.2 hi · rintro ⟨i, hi, rfl⟩; apply hf' calc #s = #((range n).attach.image fun i => f i.1 (mem_range.1 i.2)) := by rw [this] _ = #(range n).attach := ?_ _ = #(range n) := card_attach _ = n := card_range n apply card_image_of_injective intro ⟨i, hi⟩ ⟨j, hj⟩ eq exact Subtype.eq <\| f_inj i j (mem_range.1 hi) (mem_range.1 hj) eq section bij variable {t : Finset β} /-- Reorder a finset. The difference with `Finset.card_bij'` is that the bijection is specified as a surjective injection, rather than by an inverse function. The difference with `Finset.card_nbij` is that the bijection is allowed to use membership of the domain, rather than being a non-dependent function. -/ lemma card_bij (i : ∀ a ∈ s, β) (hi : ∀ a ha, i a ha ∈ t) (i_inj : ∀ a₁ ha₁ a₂ ha₂, i a₁ ha₁ = i a₂ ha₂ → a₁ = a₂) (i_surj : ∀ b ∈ t, ∃ a ha, i a ha = b) : #s = #t := by classical calc #s = #s.attach := card_attach.symm _ = #(s.attach.image fun a ↦ i a.1 a.2) := Eq.symm ?_ _ = #t := ?_ · apply card_image_of_injective intro ⟨_, _⟩ ⟨_, _⟩ h simpa using i_inj _ _ _ _ h · congr 1 ext b constructor <;> intro h · obtain ⟨_, _, rfl⟩ := mem_image.1 h; apply hi · obtain ⟨a, ha, rfl⟩ := i_surj b h; exact mem_image.2 ⟨⟨a, ha⟩, by simp⟩ /-- Reorder a finset. The difference with `Finset.card_bij` is that the bijection is specified with an inverse, rather than as a surjective injection. The difference with `Finset.card_nbij'` is that the bijection and its inverse are allowed to use membership of the domains, rather than being non-dependent functions. -/ lemma card_bij' (i : ∀ a ∈ s, β) (j : ∀ a ∈ t, α) (hi : ∀ a ha, i a ha ∈ t) (hj : ∀ a ha, j a ha ∈ s) (left_inv : ∀ a ha, j (i a ha) (hi a ha) = a) (right_inv : ∀ a ha, i (j a ha) (hj a ha) = a) : #s = #t := by refine card_bij i hi (fun a1 h1 a2 h2 eq ↦ ?_) (fun b hb ↦ ⟨_, hj b hb, right_inv b hb⟩) rw [← left_inv a1 h1, ← left_inv a2 h2] simp only [eq] /-- Reorder a finset. The difference with `Finset.card_nbij'` is that the bijection is specified as a surjective injection, rather than by an inverse function. The difference with `Finset.card_bij` is that the bijection is a non-dependent function, rather than being allowed to use membership of the domain. -/ lemma card_nbij (i : α → β) (hi : ∀ a ∈ s, i a ∈ t) (i_inj : (s : Set α).InjOn i) (i_surj : (s : Set α).SurjOn i t) : #s = #t := card_bij (fun a _ ↦ i a) hi i_inj (by simpa using i_surj) /-- Reorder a finset. The difference with `Finset.card_nbij` is that the bijection is specified with an inverse, rather than as a surjective injection. The difference with `Finset.card_bij'` is that the bijection and its inverse are non-dependent functions, rather than being allowed to use membership of the domains. The difference with `Finset.card_equiv` is that bijectivity is only required to hold on the domains, rather than on the entire types. -/ lemma card_nbij' (i : α → β) (j : β → α) (hi : ∀ a ∈ s, i a ∈ t) (hj : ∀ a ∈ t, j a ∈ s) (left_inv : ∀ a ∈ s, j (i a) = a) (right_inv : ∀ a ∈ t, i (j a) = a) : #s = #t := card_bij' (fun a _ ↦ i a) (fun b _ ↦ j b) hi hj left_inv right_inv /-- Specialization of `Finset.card_nbij'` that automatically fills in most arguments. See `Fintype.card_equiv` for the version where `s` and `t` are `univ`. -/ lemma card_equiv (e : α ≃ β) (hst : ∀ i, i ∈ s ↔ e i ∈ t) : #s = #t := by refine card_nbij' e e.symm ?_ ?_ ?_ ?_ <;> simp [hst] /-- Specialization of `Finset.card_nbij` that automatically fills in most arguments. See `Fintype.card_bijective` for the version where `s` and `t` are `univ`. -/ lemma card_bijective (e : α → β) (he : e.Bijective) (hst : ∀ i, i ∈ s ↔ e i ∈ t) : #s = #t := card_equiv (.ofBijective e he) hst lemma card_le_card_of_injOn (f : α → β) (hf : ∀ a ∈ s, f a ∈ t) (f_inj : (s : Set α).InjOn f) : #s ≤ #t := by classical calc #s = #(s.image f) := (card_image_of_injOn f_inj).symm _ ≤ #t := card_le_card <\| image_subset_iff.2 hf lemma card_le_card_of_injective {f : s → t} (hf : f.Injective) : #s ≤ #t := by rcases s.eq_empty_or_nonempty with rfl \| ⟨a₀, ha₀⟩ · simp · classical let f' : α → β := fun a => f (if ha : a ∈ s then ⟨a, ha⟩ else ⟨a₀, ha₀⟩) apply card_le_card_of_injOn f' · aesop · intro a₁ ha₁ a₂ ha₂ haa rw [mem_coe] at ha₁ ha₂ simp only [f', ha₁, ha₂, ← Subtype.ext_iff] at haa exact Subtype.ext_iff.mp (hf haa) lemma card_le_card_of_surjOn (f : α → β) (hf : Set.SurjOn f s t) : #t ≤ #s := by classical unfold Set.SurjOn at hf; exact (card_le_card (mod_cast hf)).trans card_image_le /-- If there are more pigeons than pigeonholes, then there are two pigeons in the same pigeonhole. -/ theorem exists_ne_map_eq_of_card_lt_of_maps_to {t : Finset β} (hc : #t < #s) {f : α → β} (hf : ∀ a ∈ s, f a ∈ t) : ∃ x ∈ s, ∃ y ∈ s, x ≠ y ∧ f x = f y := by classical by_contra! hz refine hc.not_le (card_le_card_of_injOn f hf ?_) intro x hx y hy contrapose exact hz x hx y hy lemma le_card_of_inj_on_range (f : ℕ → α) (hf : ∀ i < n, f i ∈ s) (f_inj : ∀ i < n, ∀ j < n, f i = f j → i = j) : n ≤ #s := calc n = #(range n) := (card_range n).symm _ ≤ #s := card_le_card_of_injOn f (by simpa only [mem_range]) (by simpa) lemma surjOn_of_injOn_of_card_le (f : α → β) (hf : Set.MapsTo f s t) (hinj : Set.InjOn f s) (hst : #t ≤ #s) : Set.SurjOn f s t := by classical suffices s.image f = t by simp [← this, Set.SurjOn] have : s.image f ⊆ t := by aesop (add simp Finset.subset_iff) exact eq_of_subset_of_card_le this (hst.trans_eq (card_image_of_injOn hinj).symm) lemma surj_on_of_inj_on_of_card_le (f : ∀ a ∈ s, β) (hf : ∀ a ha, f a ha ∈ t) (hinj : ∀ a₁ a₂ ha₁ ha₂, f a₁ ha₁ = f a₂ ha₂ → a₁ = a₂) (hst : #t ≤ #s) : ∀ b ∈ t, ∃ a ha, b = f a ha := by let f' : s → β := fun a ↦ f a a.2 have hinj' : Set.InjOn f' s.attach := fun x hx y hy hxy ↦ Subtype.ext (hinj _ _ x.2 y.2 hxy) have hmapsto' : Set.MapsTo f' s.attach t := fun x hx ↦ hf _ _ intro b hb obtain ⟨a, ha, rfl⟩ := surjOn_of_injOn_of_card_le _ hmapsto' hinj' (by rwa [card_attach]) hb exact ⟨a, a.2, rfl⟩ lemma injOn_of_surjOn_of_card_le (f : α → β) (hf : Set.MapsTo f s t) (hsurj : Set.SurjOn f s t) (hst : #s ≤ #t) : Set.InjOn f s := by classical have : s.image f = t := Finset.coe_injective <\| by simp [hsurj.image_eq_of_mapsTo hf] have : #(s.image f) = #t := by rw [this] have : #(s.image f) ≤ #s := card_image_le rw [← card_image_iff] omega theorem inj_on_of_surj_on_of_card_le (f : ∀ a ∈ s, β) (hf : ∀ a ha, f a ha ∈ t) (hsurj : ∀ b ∈ t, ∃ a ha, f a ha = b) (hst : #s ≤ #t) ⦃a₁⦄ (ha₁ : a₁ ∈ s) ⦃a₂⦄ (ha₂ : a₂ ∈ s) (ha₁a₂ : f a₁ ha₁ = f a₂ ha₂) : a₁ = a₂ := by let f' : s → β := fun a ↦ f a a.2 have hsurj' : Set.SurjOn f' s.attach t := fun x hx ↦ by simpa [f'] using hsurj x hx have hinj' := injOn_of_surjOn_of_card_le f' (fun x hx ↦ hf _ _) hsurj' (by simpa) exact congrArg Subtype.val (@hinj' ⟨a₁, ha₁⟩ (by simp) ⟨a₂, ha₂⟩ (by simp) ha₁a₂) end bij @[simp] theorem card_disjUnion (s t : Finset α) (h) : #(s.disjUnion t h) = #s + #t := Multiset.card_add _ _ /-! ### Lattice structure -/ section Lattice variable [DecidableEq α] theorem card_union_add_card_inter (s t : Finset α) : #(s ∪ t) + #(s ∩ t) = #s + #t := Finset.induction_on t (by simp) fun a r har h => by by_cases a ∈ s <;> simp [, ← Nat.add_assoc, Nat.add_right_comm _ 1] theorem card_inter_add_card_union (s t : Finset α) : #(s ∩ t) + #(s ∪ t) = #s + #t := by rw [Nat.add_comm, card_union_add_card_inter] lemma card_union (s t : Finset α) : #(s ∪ t) = #s + #t - #(s ∩ t) := by rw [← card_union_add_card_inter, Nat.add_sub_cancel] lemma card_inter (s t : Finset α) : #(s ∩ t) = #s + #t - #(s ∪ t) := by rw [← card_inter_add_card_union, Nat.add_sub_cancel] theorem card_union_le (s t : Finset α) : #(s ∪ t) ≤ #s + #t := card_union_add_card_inter s t ▸ Nat.le_add_right _ _ lemma card_union_eq_card_add_card : #(s ∪ t) = #s + #t ↔ Disjoint s t := by rw [← card_union_add_card_inter]; simp [disjoint_iff_inter_eq_empty] @[simp] alias ⟨_, card_union_of_disjoint⟩ := card_union_eq_card_add_card theorem card_sdiff (h : s ⊆ t) : #(t \ s) = #t - #s := by suffices #(t \ s) = #(t \ s ∪ s) - #s by rwa [sdiff_union_of_subset h] at this rw [card_union_of_disjoint sdiff_disjoint, Nat.add_sub_cancel_right] theorem card_sdiff_add_card_eq_card {s t : Finset α} (h : s ⊆ t) : #(t \ s) + #s = #t := ((Nat.sub_eq_iff_eq_add (card_le_card h)).mp (card_sdiff h).symm).symm theorem le_card_sdiff (s t : Finset α) : #t - #s ≤ #(t \ s) := calc #t - #s ≤ #t - #(s ∩ t) := Nat.sub_le_sub_left (card_le_card inter_subset_left) _ _ = #(t \ (s ∩ t)) := (card_sdiff inter_subset_right).symm _ ≤ #(t \ s) := by rw [sdiff_inter_self_right t s] theorem card_le_card_sdiff_add_card : #s ≤ #(s \ t) + #t := Nat.sub_le_iff_le_add.1 <\| le_card_sdiff _ _ theorem card_sdiff_add_card (s t : Finset α) : #(s \ t) + #t = #(s ∪ t) := by rw [← card_union_of_disjoint sdiff_disjoint, sdiff_union_self_eq_union] lemma card_sdiff_comm (h : #s = #t) : #(s \ t) = #(t \ s) := Nat.add_right_cancel (m := #t) <\| by simp_rw [card_sdiff_add_card, ← h, card_sdiff_add_card, union_comm] theorem sdiff_nonempty_of_card_lt_card (h : #s < #t) : (t \ s).Nonempty := by rw [nonempty_iff_ne_empty, Ne, sdiff_eq_empty_iff_subset] exact fun h' ↦ h.not_le (card_le_card h') omit [DecidableEq α] in theorem exists_mem_not_mem_of_card_lt_card (h : #s < #t) : ∃ e, e ∈ t ∧ e ∉ s := by classical simpa [Finset.Nonempty] using sdiff_nonempty_of_card_lt_card h @[simp] lemma card_sdiff_add_card_inter (s t : Finset α) : #(s \ t) + #(s ∩ t) = #s := by rw [← card_union_of_disjoint (disjoint_sdiff_inter _ _), sdiff_union_inter] @[simp] lemma card_inter_add_card_sdiff (s t : Finset α) : #(s ∩ t) + #(s \ t) = #s := by rw [Nat.add_comm, card_sdiff_add_card_inter] /-- Pigeonhole principle for two finsets inside an ambient finset. -/ theorem inter_nonempty_of_card_lt_card_add_card (hts : t ⊆ s) (hus : u ⊆ s) (hstu : #s < #t + #u) : (t ∩ u).Nonempty := by contrapose! hstu calc _ = #(t ∪ u) := by simp [← card_union_add_card_inter, not_nonempty_iff_eq_empty.1 hstu] _ ≤ #s := by gcongr; exact union_subset hts hus end Lattice theorem filter_card_add_filter_neg_card_eq_card (p : α → Prop) [DecidablePred p] [∀ x, Decidable (¬p x)] : #(s.filter p) + #(s.filter fun a ↦ ¬ p a) = #s := by classical rw [← card_union_of_disjoint (disjoint_filter_filter_neg _ _ _), filter_union_filter_neg_eq] /-- Given a subset `s` of a set `t`, of sizes at most and at least `n` respectively, there exists a set `u` of size `n` which is both a superset of `s` and a subset of `t`. -/ lemma exists_subsuperset_card_eq (hst : s ⊆ t) (hsn : #s ≤ n) (hnt : n ≤ #t) : ∃ u, s ⊆ u ∧ u ⊆ t ∧ #u = n := by classical refine Nat.decreasingInduction' ?_ hnt ⟨t, by simp [hst]⟩ intro k _ hnk ⟨u, hu₁, hu₂, hu₃⟩ obtain ⟨a, ha⟩ : (u \ s).Nonempty := by rw [← card_pos, card_sdiff hu₁]; omega simp only [mem_sdiff] at ha exact ⟨u.erase a, by simp [subset_erase, erase_subset_iff_of_mem (hu₂ _), ]⟩ /-- We can shrink a set to any smaller size. -/ lemma exists_subset_card_eq (hns : n ≤ #s) : ∃ t ⊆ s, #t = n := by simpa using exists_subsuperset_card_eq s.empty_subset (by simp) hns theorem le_card_iff_exists_subset_card : n ≤ #s ↔ ∃ t ⊆ s, #t = n := by refine ⟨fun h => ?_, fun ⟨t, hst, ht⟩ => ht ▸ card_le_card hst⟩ exact exists_subset_card_eq h theorem exists_subset_or_subset_of_two_mul_lt_card [DecidableEq α] {X Y : Finset α} {n : ℕ} (hXY : 2 n < #(X ∪ Y)) : ∃ C : Finset α, n < #C ∧ (C ⊆ X ∨ C ⊆ Y) := by have h₁ : #(X ∩ (Y \ X)) = 0 := Finset.card_eq_zero.mpr (Finset.inter_sdiff_self X Y) have h₂ : #(X ∪ Y) = #X + #(Y \ X) := by rw [← card_union_add_card_inter X (Y \ X), Finset.union_sdiff_self_eq_union, h₁, Nat.add_zero] rw [h₂, Nat.two_mul] at hXY obtain h \| h : n < #X ∨ n < #(Y \ X) := by contrapose! hXY; omega	· exact ⟨X, h, Or.inl (Finset.Subset.refl X)⟩ · exact ⟨Y \ X, h, Or.inr sdiff_subset⟩	Mathlib/Data/Finset/Card.lean	586	587
/- Copyright (c) 2018 Robert Y. Lewis. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Robert Y. Lewis -/ import Mathlib.NumberTheory.Padics.PadicVal.Basic /-! # p-adic norm This file defines the `p`-adic norm on `ℚ`. The `p`-adic valuation on `ℚ` is the difference of the multiplicities of `p` in the numerator and denominator of `q`. This function obeys the standard properties of a valuation, with the appropriate assumptions on `p`. The valuation induces a norm on `ℚ`. This norm is a nonarchimedean absolute value. It takes values in {0} ∪ {1/p^k \| k ∈ ℤ}. ## Implementation notes Much, but not all, of this file assumes that `p` is prime. This assumption is inferred automatically by taking `[Fact p.Prime]` as a type class argument. ## References * [F. Q. Gouvêa, p-adic numbers][gouvea1997] * [R. Y. Lewis, A formal proof of Hensel's lemma over the p-adic integers][lewis2019] * <https://en.wikipedia.org/wiki/P-adic_number> ## Tags p-adic, p adic, padic, norm, valuation -/ /-- If `q ≠ 0`, the `p`-adic norm of a rational `q` is `p ^ (-padicValRat p q)`. If `q = 0`, the `p`-adic norm of `q` is `0`. -/ def padicNorm (p : ℕ) (q : ℚ) : ℚ := if q = 0 then 0 else (p : ℚ) ^ (-padicValRat p q) namespace padicNorm open padicValRat variable {p : ℕ} /-- Unfolds the definition of the `p`-adic norm of `q` when `q ≠ 0`. -/ @[simp] protected theorem eq_zpow_of_nonzero {q : ℚ} (hq : q ≠ 0) : padicNorm p q = (p : ℚ) ^ (-padicValRat p q) := by simp [hq, padicNorm] /-- The `p`-adic norm is nonnegative. -/ protected theorem nonneg (q : ℚ) : 0 ≤ padicNorm p q := if hq : q = 0 then by simp [hq, padicNorm] else by unfold padicNorm split_ifs apply zpow_nonneg exact mod_cast Nat.zero_le _ /-- The `p`-adic norm of `0` is `0`. -/ @[simp] protected theorem zero : padicNorm p 0 = 0 := by simp [padicNorm] /-- The `p`-adic norm of `1` is `1`. -/ protected theorem one : padicNorm p 1 = 1 := by simp [padicNorm] /-- The `p`-adic norm of `p` is `p⁻¹` if `p > 1`. See also `padicNorm.padicNorm_p_of_prime` for a version assuming `p` is prime. -/ theorem padicNorm_p (hp : 1 < p) : padicNorm p p = (p : ℚ)⁻¹ := by simp [padicNorm, (pos_of_gt hp).ne', padicValNat.self hp] /-- The `p`-adic norm of `p` is `p⁻¹` if `p` is prime. See also `padicNorm.padicNorm_p` for a version assuming `1 < p`. -/ @[simp] theorem padicNorm_p_of_prime [Fact p.Prime] : padicNorm p p = (p : ℚ)⁻¹ := padicNorm_p <\| Nat.Prime.one_lt Fact.out /-- The `p`-adic norm of `q` is `1` if `q` is prime and not equal to `p`. -/ theorem padicNorm_of_prime_of_ne {q : ℕ} [p_prime : Fact p.Prime] [q_prime : Fact q.Prime] (neq : p ≠ q) : padicNorm p q = 1 := by have p : padicValRat p q = 0 := mod_cast padicValNat_primes neq rw [padicNorm, p] simp [q_prime.1.ne_zero] /-- The `p`-adic norm of `p` is less than `1` if `1 < p`. See also `padicNorm.padicNorm_p_lt_one_of_prime` for a version assuming `p` is prime. -/ theorem padicNorm_p_lt_one (hp : 1 < p) : padicNorm p p < 1 := by rw [padicNorm_p hp, inv_lt_one_iff₀] exact mod_cast Or.inr hp /-- The `p`-adic norm of `p` is less than `1` if `p` is prime. See also `padicNorm.padicNorm_p_lt_one` for a version assuming `1 < p`. -/ theorem padicNorm_p_lt_one_of_prime [Fact p.Prime] : padicNorm p p < 1 := padicNorm_p_lt_one <\| Nat.Prime.one_lt Fact.out /-- `padicNorm p q` takes discrete values `p ^ -z` for `z : ℤ`. -/ protected theorem values_discrete {q : ℚ} (hq : q ≠ 0) : ∃ z : ℤ, padicNorm p q = (p : ℚ) ^ (-z) := ⟨padicValRat p q, by simp [padicNorm, hq]⟩ /-- `padicNorm p` is symmetric. -/ @[simp] protected theorem neg (q : ℚ) : padicNorm p (-q) = padicNorm p q := if hq : q = 0 then by simp [hq] else by simp [padicNorm, hq] variable [hp : Fact p.Prime] /-- If `q ≠ 0`, then `padicNorm p q ≠ 0`. -/ protected theorem nonzero {q : ℚ} (hq : q ≠ 0) : padicNorm p q ≠ 0 := by rw [padicNorm.eq_zpow_of_nonzero hq] apply zpow_ne_zero exact mod_cast ne_of_gt hp.1.pos /-- If the `p`-adic norm of `q` is 0, then `q` is `0`. -/ theorem zero_of_padicNorm_eq_zero {q : ℚ} (h : padicNorm p q = 0) : q = 0 := by apply by_contradiction; intro hq unfold padicNorm at h; rw [if_neg hq] at h apply absurd h apply zpow_ne_zero exact mod_cast hp.1.ne_zero /-- The `p`-adic norm is multiplicative. -/ @[simp] protected theorem mul (q r : ℚ) : padicNorm p (q * r) = padicNorm p q * padicNorm p r := if hq : q = 0 then by simp [hq] else if hr : r = 0 then by simp [hr] else by have : (p : ℚ) ≠ 0 := by simp [hp.1.ne_zero] simp [padicNorm, *, padicValRat.mul, zpow_add₀ this, mul_comm] /-- The `p`-adic norm respects division. -/ @[simp] protected theorem div (q r : ℚ) : padicNorm p (q / r) = padicNorm p q / padicNorm p r := if hr : r = 0 then by simp [hr] else eq_div_of_mul_eq (padicNorm.nonzero hr) (by rw [← padicNorm.mul, div_mul_cancel₀ _ hr]) /-- The `p`-adic norm of an integer is at most `1`. -/ protected theorem of_int (z : ℤ) : padicNorm p z ≤ 1 := by obtain rfl \| hz := eq_or_ne z 0 · simp · rw [padicNorm, if_neg (mod_cast hz)] exact zpow_le_one_of_nonpos₀ (mod_cast hp.1.one_le) (by simp) private theorem nonarchimedean_aux {q r : ℚ} (h : padicValRat p q ≤ padicValRat p r) : padicNorm p (q + r) ≤ max (padicNorm p q) (padicNorm p r) := have hnqp : padicNorm p q ≥ 0 := padicNorm.nonneg _ have hnrp : padicNorm p r ≥ 0 := padicNorm.nonneg _ if hq : q = 0 then by simp [hq, max_eq_right hnrp, le_max_right] else if hr : r = 0 then by simp [hr, max_eq_left hnqp, le_max_left] else if hqr : q + r = 0 then le_trans (by simpa [hqr] using hnqp) (le_max_left _ _) else by unfold padicNorm; split_ifs apply le_max_iff.2 left apply zpow_le_zpow_right₀ · exact mod_cast le_of_lt hp.1.one_lt · apply neg_le_neg have : padicValRat p q = min (padicValRat p q) (padicValRat p r) := (min_eq_left h).symm rw [this] exact min_le_padicValRat_add hqr /-- The `p`-adic norm is nonarchimedean: the norm of `p + q` is at most the max of the norm of `p` and the norm of `q`. -/ protected theorem nonarchimedean {q r : ℚ} : padicNorm p (q + r) ≤ max (padicNorm p q) (padicNorm p r) := by wlog hle : padicValRat p q ≤ padicValRat p r generalizing q r · rw [add_comm, max_comm] exact this (le_of_not_le hle) exact nonarchimedean_aux hle /-- The `p`-adic norm respects the triangle inequality: the norm of `p + q` is at most the norm of `p` plus the norm of `q`. -/ theorem triangle_ineq (q r : ℚ) : padicNorm p (q + r) ≤ padicNorm p q + padicNorm p r := calc padicNorm p (q + r) ≤ max (padicNorm p q) (padicNorm p r) := padicNorm.nonarchimedean _ ≤ padicNorm p q + padicNorm p r := max_le_add_of_nonneg (padicNorm.nonneg _) (padicNorm.nonneg _) /-- The `p`-adic norm of a difference is at most the max of each component. Restates the archimedean property of the `p`-adic norm. -/ protected theorem sub {q r : ℚ} : padicNorm p (q - r) ≤ max (padicNorm p q) (padicNorm p r) := by rw [sub_eq_add_neg, ← padicNorm.neg r] exact padicNorm.nonarchimedean /-- If the `p`-adic norms of `q` and `r` are different, then the norm of `q + r` is equal to the max of the norms of `q` and `r`. -/ theorem add_eq_max_of_ne {q r : ℚ} (hne : padicNorm p q ≠ padicNorm p r) : padicNorm p (q + r) = max (padicNorm p q) (padicNorm p r) := by wlog hlt : padicNorm p r < padicNorm p q · rw [add_comm, max_comm] exact this hne.symm (hne.lt_or_lt.resolve_right hlt) have : padicNorm p q ≤ max (padicNorm p (q + r)) (padicNorm p r) := calc padicNorm p q = padicNorm p (q + r + (-r)) := by ring_nf _ ≤ max (padicNorm p (q + r)) (padicNorm p (-r)) := padicNorm.nonarchimedean _ = max (padicNorm p (q + r)) (padicNorm p r) := by simp have hnge : padicNorm p r ≤ padicNorm p (q + r) := by apply le_of_not_gt intro hgt rw [max_eq_right_of_lt hgt] at this exact not_lt_of_ge this hlt have : padicNorm p q ≤ padicNorm p (q + r) := by rwa [max_eq_left hnge] at this apply _root_.le_antisymm · apply padicNorm.nonarchimedean · rwa [max_eq_left_of_lt hlt] /-- The `p`-adic norm is an absolute value: positive-definite and multiplicative, satisfying the triangle inequality. -/ instance : IsAbsoluteValue (padicNorm p) where abv_nonneg' := padicNorm.nonneg abv_eq_zero' := ⟨zero_of_padicNorm_eq_zero, fun hx ↦ by simp [hx]⟩ abv_add' := padicNorm.triangle_ineq abv_mul' := padicNorm.mul theorem dvd_iff_norm_le {n : ℕ} {z : ℤ} : ↑(p ^ n) ∣ z ↔ padicNorm p z ≤ (p : ℚ) ^ (-n : ℤ) := by unfold padicNorm; split_ifs with hz · norm_cast at hz simp [hz] · rw [zpow_le_zpow_iff_right₀, neg_le_neg_iff, padicValRat.of_int, padicValInt.of_ne_one_ne_zero hp.1.ne_one _] · norm_cast rw [← FiniteMultiplicity.pow_dvd_iff_le_multiplicity] · norm_cast · apply Int.finiteMultiplicity_iff.2 ⟨by simp [hp.out.ne_one], mod_cast hz⟩ · exact_mod_cast hz · exact_mod_cast hp.out.one_lt /-- The `p`-adic norm of an integer `m` is one iff `p` doesn't divide `m`. -/ theorem int_eq_one_iff (m : ℤ) : padicNorm p m = 1 ↔ ¬(p : ℤ) ∣ m := by nth_rw 2 [← pow_one p] simp only [dvd_iff_norm_le, Int.cast_natCast, Nat.cast_one, zpow_neg, zpow_one, not_le] constructor · intro h rw [h, inv_lt_one₀] <;> norm_cast · exact Nat.Prime.one_lt Fact.out · exact Nat.Prime.pos Fact.out · simp only [padicNorm] split_ifs · rw [inv_lt_zero, ← Nat.cast_zero, Nat.cast_lt] intro h exact (Nat.not_lt_zero p h).elim · have : 1 < (p : ℚ) := by norm_cast; exact Nat.Prime.one_lt (Fact.out : Nat.Prime p) rw [← zpow_neg_one, zpow_lt_zpow_iff_right₀ this] have : 0 ≤ padicValRat p m := by simp only [of_int, Nat.cast_nonneg] intro h rw [← zpow_zero (p : ℚ), zpow_right_inj₀] <;> linarith theorem int_lt_one_iff (m : ℤ) : padicNorm p m < 1 ↔ (p : ℤ) ∣ m := by rw [← not_iff_not, ← int_eq_one_iff, eq_iff_le_not_lt] simp only [padicNorm.of_int, true_and] theorem of_nat (m : ℕ) : padicNorm p m ≤ 1 := padicNorm.of_int (m : ℤ) /-- The `p`-adic norm of a natural `m` is one iff `p` doesn't divide `m`. -/ theorem nat_eq_one_iff (m : ℕ) : padicNorm p m = 1 ↔ ¬p ∣ m := by rw [← Int.natCast_dvd_natCast, ← int_eq_one_iff, Int.cast_natCast] theorem nat_lt_one_iff (m : ℕ) : padicNorm p m < 1 ↔ p ∣ m := by	rw [← Int.natCast_dvd_natCast, ← int_lt_one_iff, Int.cast_natCast] /-- If a rational is not a p-adic integer, it is not an integer. -/ theorem not_int_of_not_padic_int (p : ℕ) {a : ℚ} [hp : Fact (Nat.Prime p)] (H : 1 < padicNorm p a) : ¬ a.isInt := by contrapose! H rw [Rat.eq_num_of_isInt H] apply padicNorm.of_int theorem sum_lt {α : Type*} {F : α → ℚ} {t : ℚ} {s : Finset α} : s.Nonempty → (∀ i ∈ s, padicNorm p (F i) < t) → padicNorm p (∑ i ∈ s, F i) < t := by classical refine s.induction_on (by rintro ⟨-, ⟨⟩⟩) ?_ rintro a S haS IH - ht by_cases hs : S.Nonempty · rw [Finset.sum_insert haS] exact lt_of_le_of_lt padicNorm.nonarchimedean	Mathlib/NumberTheory/Padics/PadicNorm.lean	268	285
/- Copyright (c) 2017 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Data.Finite.Defs import Mathlib.Data.Finset.BooleanAlgebra import Mathlib.Data.Finset.Image import Mathlib.Data.Fintype.Defs import Mathlib.Data.Fintype.OfMap import Mathlib.Data.Fintype.Sets import Mathlib.Data.List.FinRange /-! # Instances for finite types This file is a collection of basic `Fintype` instances for types such as `Fin`, `Prod` and pi types. -/ assert_not_exists Monoid open Function open Nat universe u v variable {α β γ : Type} open Finset instance Fin.fintype (n : ℕ) : Fintype (Fin n) := ⟨⟨List.finRange n, List.nodup_finRange n⟩, List.mem_finRange⟩ theorem Fin.univ_def (n : ℕ) : (univ : Finset (Fin n)) = ⟨List.finRange n, List.nodup_finRange n⟩ := rfl theorem Finset.val_univ_fin (n : ℕ) : (Finset.univ : Finset (Fin n)).val = List.finRange n := rfl /-- See also `nonempty_encodable`, `nonempty_denumerable`. -/ theorem nonempty_fintype (α : Type) [Finite α] : Nonempty (Fintype α) := by rcases Finite.exists_equiv_fin α with ⟨n, ⟨e⟩⟩ exact ⟨.ofEquiv _ e.symm⟩ @[simp] theorem List.toFinset_finRange (n : ℕ) : (List.finRange n).toFinset = Finset.univ := by ext; simp @[simp] theorem Fin.univ_val_map {n : ℕ} (f : Fin n → α) : Finset.univ.val.map f = List.ofFn f := by simp [List.ofFn_eq_map, univ_def] theorem Fin.univ_image_def {n : ℕ} [DecidableEq α] (f : Fin n → α) : Finset.univ.image f = (List.ofFn f).toFinset := by simp [Finset.image] theorem Fin.univ_map_def {n : ℕ} (f : Fin n ↪ α) : Finset.univ.map f = ⟨List.ofFn f, List.nodup_ofFn.mpr f.injective⟩ := by simp [Finset.map] @[simp] theorem Fin.image_succAbove_univ {n : ℕ} (i : Fin (n + 1)) : univ.image i.succAbove = {i}ᶜ := by ext m simp @[simp] theorem Fin.image_succ_univ (n : ℕ) : (univ : Finset (Fin n)).image Fin.succ = {0}ᶜ := by rw [← Fin.succAbove_zero, Fin.image_succAbove_univ] @[simp] theorem Fin.image_castSucc (n : ℕ) : (univ : Finset (Fin n)).image Fin.castSucc = {Fin.last n}ᶜ := by rw [← Fin.succAbove_last, Fin.image_succAbove_univ] /- The following three lemmas use `Finset.cons` instead of `insert` and `Finset.map` instead of `Finset.image` to reduce proof obligations downstream. -/ /-- Embed `Fin n` into `Fin (n + 1)` by prepending zero to the `univ` -/ theorem Fin.univ_succ (n : ℕ) : (univ : Finset (Fin (n + 1))) = Finset.cons 0 (univ.map ⟨Fin.succ, Fin.succ_injective _⟩) (by simp [map_eq_image]) := by simp [map_eq_image] /-- Embed `Fin n` into `Fin (n + 1)` by appending a new `Fin.last n` to the `univ` -/ theorem Fin.univ_castSuccEmb (n : ℕ) : (univ : Finset (Fin (n + 1))) = Finset.cons (Fin.last n) (univ.map Fin.castSuccEmb) (by simp [map_eq_image]) := by simp [map_eq_image] /-- Embed `Fin n` into `Fin (n + 1)` by inserting around a specified pivot `p : Fin (n + 1)` into the `univ` -/ theorem Fin.univ_succAbove (n : ℕ) (p : Fin (n + 1)) : (univ : Finset (Fin (n + 1))) = Finset.cons p (univ.map <\| Fin.succAboveEmb p) (by simp) := by simp [map_eq_image] @[simp] theorem Fin.univ_image_get [DecidableEq α] (l : List α) : Finset.univ.image l.get = l.toFinset := by simp [univ_image_def] @[simp] theorem Fin.univ_image_getElem' [DecidableEq β] (l : List α) (f : α → β) : Finset.univ.image (fun i : Fin l.length => f <\| l[(i : Nat)]) = (l.map f).toFinset := by simp only [univ_image_def, List.ofFn_getElem_eq_map] theorem Fin.univ_image_get' [DecidableEq β] (l : List α) (f : α → β) : Finset.univ.image (f <\| l.get ·) = (l.map f).toFinset := by simp @[instance] def Unique.fintype {α : Type} [Unique α] : Fintype α := Fintype.ofSubsingleton default /-- Short-circuit instance to decrease search for `Unique.fintype`, since that relies on a subsingleton elimination for `Unique`. -/ instance Fintype.subtypeEq (y : α) : Fintype { x // x = y } := Fintype.subtype {y} (by simp) /-- Short-circuit instance to decrease search for `Unique.fintype`, since that relies on a subsingleton elimination for `Unique`. -/ instance Fintype.subtypeEq' (y : α) : Fintype { x // y = x } := Fintype.subtype {y} (by simp [eq_comm]) theorem Fintype.univ_empty : @univ Empty _ = ∅ := rfl theorem Fintype.univ_pempty : @univ PEmpty _ = ∅ := rfl instance Unit.fintype : Fintype Unit := Fintype.ofSubsingleton () theorem Fintype.univ_unit : @univ Unit _ = {()} := rfl instance PUnit.fintype : Fintype PUnit := Fintype.ofSubsingleton PUnit.unit theorem Fintype.univ_punit : @univ PUnit _ = {PUnit.unit} := rfl @[simp] theorem Fintype.univ_bool : @univ Bool _ = {true, false} := rfl /-- Given that `α × β` is a fintype, `α` is also a fintype. -/ def Fintype.prodLeft {α β} [DecidableEq α] [Fintype (α × β)] [Nonempty β] : Fintype α := ⟨(@univ (α × β) _).image Prod.fst, fun a => by simp⟩ /-- Given that `α × β` is a fintype, `β` is also a fintype. -/ def Fintype.prodRight {α β} [DecidableEq β] [Fintype (α × β)] [Nonempty α] : Fintype β := ⟨(@univ (α × β) _).image Prod.snd, fun b => by simp⟩ instance ULift.fintype (α : Type) [Fintype α] : Fintype (ULift α) := Fintype.ofEquiv _ Equiv.ulift.symm instance PLift.fintype (α : Type) [Fintype α] : Fintype (PLift α) := Fintype.ofEquiv _ Equiv.plift.symm instance PLift.fintypeProp (p : Prop) [Decidable p] : Fintype (PLift p) := ⟨if h : p then {⟨h⟩} else ∅, fun ⟨h⟩ => by simp [h]⟩ instance Quotient.fintype [Fintype α] (s : Setoid α) [DecidableRel ((· ≈ ·) : α → α → Prop)] : Fintype (Quotient s) := Fintype.ofSurjective Quotient.mk'' Quotient.mk''_surjective instance PSigma.fintypePropLeft {α : Prop} {β : α → Type} [Decidable α] [∀ a, Fintype (β a)] : Fintype (Σ'a, β a) := if h : α then Fintype.ofEquiv (β h) ⟨fun x => ⟨h, x⟩, PSigma.snd, fun _ => rfl, fun ⟨_, _⟩ => rfl⟩ else ⟨∅, fun x => (h x.1).elim⟩ instance PSigma.fintypePropRight {α : Type} {β : α → Prop} [∀ a, Decidable (β a)] [Fintype α] : Fintype (Σ'a, β a) := Fintype.ofEquiv { a // β a } ⟨fun ⟨x, y⟩ => ⟨x, y⟩, fun ⟨x, y⟩ => ⟨x, y⟩, fun ⟨_, _⟩ => rfl, fun ⟨_, _⟩ => rfl⟩ instance PSigma.fintypePropProp {α : Prop} {β : α → Prop} [Decidable α] [∀ a, Decidable (β a)] : Fintype (Σ'a, β a) := if h : ∃ a, β a then ⟨{⟨h.fst, h.snd⟩}, fun ⟨_, _⟩ => by simp⟩ else ⟨∅, fun ⟨x, y⟩ => (h ⟨x, y⟩).elim⟩ instance pfunFintype (p : Prop) [Decidable p] (α : p → Type) [∀ hp, Fintype (α hp)] : Fintype (∀ hp : p, α hp) := if hp : p then Fintype.ofEquiv (α hp) ⟨fun a _ => a, fun f => f hp, fun _ => rfl, fun _ => rfl⟩ else ⟨singleton fun h => (hp h).elim, fun h => mem_singleton.2 (funext fun x => by contradiction)⟩ section Trunc /-- For `s : Multiset α`, we can lift the existential statement that `∃ x, x ∈ s` to a `Trunc α`. -/ def truncOfMultisetExistsMem {α} (s : Multiset α) : (∃ x, x ∈ s) → Trunc α := Quotient.recOnSubsingleton s fun l h => match l, h with \| [], _ => False.elim (by tauto) \| a :: _, _ => Trunc.mk a /-- A `Nonempty` `Fintype` constructively contains an element. -/ def truncOfNonemptyFintype (α) [Nonempty α] [Fintype α] : Trunc α := truncOfMultisetExistsMem Finset.univ.val (by simp) /-- By iterating over the elements of a fintype, we can lift an existential statement `∃ a, P a` to `Trunc (Σ' a, P a)`, containing data. -/ def truncSigmaOfExists {α} [Fintype α] {P : α → Prop} [DecidablePred P] (h : ∃ a, P a) : Trunc (Σ'a, P a) := @truncOfNonemptyFintype (Σ'a, P a) ((Exists.elim h) fun a ha => ⟨⟨a, ha⟩⟩) _ end Trunc namespace Multiset variable [Fintype α] [Fintype β] @[simp] theorem count_univ [DecidableEq α] (a : α) : count a Finset.univ.val = 1 := count_eq_one_of_mem Finset.univ.nodup (Finset.mem_univ _) @[simp] theorem map_univ_val_equiv (e : α ≃ β) : map e univ.val = univ.val := by rw [← congr_arg Finset.val (Finset.map_univ_equiv e), Finset.map_val, Equiv.coe_toEmbedding] /-- For functions on finite sets, they are bijections iff they map universes into universes. -/ @[simp] theorem bijective_iff_map_univ_eq_univ (f : α → β) : f.Bijective ↔ map f (Finset.univ : Finset α).val = univ.val := ⟨fun bij ↦ congr_arg (·.val) (map_univ_equiv <\| Equiv.ofBijective f bij), fun eq ↦ ⟨ fun a₁ a₂ ↦ inj_on_of_nodup_map (eq.symm ▸ univ.nodup) _ (mem_univ a₁) _ (mem_univ a₂), fun b ↦ have ⟨a, _, h⟩ := mem_map.mp (eq.symm ▸ mem_univ_val b); ⟨a, h⟩⟩⟩ end Multiset /-- Auxiliary definition to show `exists_seq_of_forall_finset_exists`. -/ noncomputable def seqOfForallFinsetExistsAux {α : Type} [DecidableEq α] (P : α → Prop) (r : α → α → Prop) (h : ∀ s : Finset α, ∃ y, (∀ x ∈ s, P x) → P y ∧ ∀ x ∈ s, r x y) : ℕ → α \| n => Classical.choose (h (Finset.image (fun i : Fin n => seqOfForallFinsetExistsAux P r h i) (Finset.univ : Finset (Fin n)))) /-- Induction principle to build a sequence, by adding one point at a time satisfying a given relation with respect to all the previously chosen points. More precisely, Assume that, for any finite set `s`, one can find another point satisfying some relation `r` with respect to all the points in `s`. Then one may construct a function `f : ℕ → α` such that `r (f m) (f n)` holds whenever `m < n`. We also ensure that all constructed points satisfy a given predicate `P`. -/ theorem exists_seq_of_forall_finset_exists {α : Type} (P : α → Prop) (r : α → α → Prop) (h : ∀ s : Finset α, (∀ x ∈ s, P x) → ∃ y, P y ∧ ∀ x ∈ s, r x y) : ∃ f : ℕ → α, (∀ n, P (f n)) ∧ ∀ m n, m < n → r (f m) (f n) := by classical have : Nonempty α := by rcases h ∅ (by simp) with ⟨y, _⟩ exact ⟨y⟩ choose! F hF using h have h' : ∀ s : Finset α, ∃ y, (∀ x ∈ s, P x) → P y ∧ ∀ x ∈ s, r x y := fun s => ⟨F s, hF s⟩ set f := seqOfForallFinsetExistsAux P r h' with hf have A : ∀ n : ℕ, P (f n) := by intro n induction' n using Nat.strong_induction_on with n IH have IH' : ∀ x : Fin n, P (f x) := fun n => IH n.1 n.2 rw [hf, seqOfForallFinsetExistsAux] exact (Classical.choose_spec (h' (Finset.image (fun i : Fin n => f i) (Finset.univ : Finset (Fin n)))) (by simp [IH'])).1 refine ⟨f, A, fun m n hmn => ?_⟩ conv_rhs => rw [hf] rw [seqOfForallFinsetExistsAux] apply (Classical.choose_spec (h' (Finset.image (fun i : Fin n => f i) (Finset.univ : Finset (Fin n)))) (by simp [A])).2 exact Finset.mem_image.2 ⟨⟨m, hmn⟩, Finset.mem_univ _, rfl⟩ /-- Induction principle to build a sequence, by adding one point at a time satisfying a given symmetric relation with respect to all the previously chosen points. More precisely, Assume that, for any finite set `s`, one can find another point satisfying some relation `r` with respect to all the points in `s`. Then one may construct a function `f : ℕ → α` such that `r (f m) (f n)` holds whenever `m ≠ n`. We also ensure that all constructed points satisfy a given predicate `P`. -/ theorem exists_seq_of_forall_finset_exists' {α : Type*} (P : α → Prop) (r : α → α → Prop) [IsSymm α r] (h : ∀ s : Finset α, (∀ x ∈ s, P x) → ∃ y, P y ∧ ∀ x ∈ s, r x y) : ∃ f : ℕ → α, (∀ n, P (f n)) ∧ Pairwise (r on f) := by rcases exists_seq_of_forall_finset_exists P r h with ⟨f, hf, hf'⟩ refine ⟨f, hf, fun m n hmn => ?_⟩ rcases lt_trichotomy m n with (h \| rfl \| h) · exact hf' m n h · exact (hmn rfl).elim · unfold Function.onFun apply symm exact hf' n m h		Mathlib/Data/Fintype/Basic.lean	332	333
/- Copyright (c) 2020 Kevin Kappelmann. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kevin Kappelmann -/ import Mathlib.Algebra.ContinuedFractions.Computation.Basic import Mathlib.Algebra.ContinuedFractions.Translations import Mathlib.Algebra.Order.Floor.Ring /-! # Basic Translation Lemmas Between Structures Defined for Computing Continued Fractions ## Summary This is a collection of simple lemmas between the different structures used for the computation of continued fractions defined in `Mathlib.Algebra.ContinuedFractions.Computation.Basic`. The file consists of three sections: 1. Recurrences and inversion lemmas for `IntFractPair.stream`: these lemmas give us inversion rules and recurrences for the computation of the stream of integer and fractional parts of a value. 2. Translation lemmas for the head term: these lemmas show us that the head term of the computed continued fraction of a value `v` is `⌊v⌋` and how this head term is moved along the structures used in the computation process. 3. Translation lemmas for the sequence: these lemmas show how the sequences of the involved structures (`IntFractPair.stream`, `IntFractPair.seq1`, and `GenContFract.of`) are connected, i.e. how the values are moved along the structures and the termination of one sequence implies the termination of another sequence. ## Main Theorems - `succ_nth_stream_eq_some_iff` gives as a recurrence to compute the `n + 1`th value of the sequence of integer and fractional parts of a value in case of non-termination. - `succ_nth_stream_eq_none_iff` gives as a recurrence to compute the `n + 1`th value of the sequence of integer and fractional parts of a value in case of termination. - `get?_of_eq_some_of_succ_get?_intFractPair_stream` and `get?_of_eq_some_of_get?_intFractPair_stream_fr_ne_zero` show how the entries of the sequence of the computed continued fraction can be obtained from the stream of integer and fractional parts. -/ assert_not_exists Finset namespace GenContFract open GenContFract (of) -- Fix a discrete linear ordered division ring with `floor` function and a value `v`. variable {K : Type*} [DivisionRing K] [LinearOrder K] [FloorRing K] {v : K} namespace IntFractPair /-! ### Recurrences and Inversion Lemmas for `IntFractPair.stream` Here we state some lemmas that give us inversion rules and recurrences for the computation of the stream of integer and fractional parts of a value. -/ theorem stream_zero (v : K) : IntFractPair.stream v 0 = some (IntFractPair.of v) := rfl variable {n : ℕ} theorem stream_eq_none_of_fr_eq_zero {ifp_n : IntFractPair K} (stream_nth_eq : IntFractPair.stream v n = some ifp_n) (nth_fr_eq_zero : ifp_n.fr = 0) : IntFractPair.stream v (n + 1) = none := by obtain ⟨_, fr⟩ := ifp_n change fr = 0 at nth_fr_eq_zero simp [IntFractPair.stream, stream_nth_eq, nth_fr_eq_zero] /-- Gives a recurrence to compute the `n + 1`th value of the sequence of integer and fractional parts of a value in case of termination. -/ theorem succ_nth_stream_eq_none_iff : IntFractPair.stream v (n + 1) = none ↔ IntFractPair.stream v n = none ∨ ∃ ifp, IntFractPair.stream v n = some ifp ∧ ifp.fr = 0 := by rw [IntFractPair.stream] cases IntFractPair.stream v n <;> simp [imp_false] /-- Gives a recurrence to compute the `n + 1`th value of the sequence of integer and fractional parts of a value in case of non-termination. -/ theorem succ_nth_stream_eq_some_iff {ifp_succ_n : IntFractPair K} : IntFractPair.stream v (n + 1) = some ifp_succ_n ↔ ∃ ifp_n : IntFractPair K, IntFractPair.stream v n = some ifp_n ∧ ifp_n.fr ≠ 0 ∧ IntFractPair.of ifp_n.fr⁻¹ = ifp_succ_n := by simp [IntFractPair.stream, ite_eq_iff, Option.bind_eq_some_iff] /-- An easier to use version of one direction of `GenContFract.IntFractPair.succ_nth_stream_eq_some_iff`. -/ theorem stream_succ_of_some {p : IntFractPair K} (h : IntFractPair.stream v n = some p) (h' : p.fr ≠ 0) : IntFractPair.stream v (n + 1) = some (IntFractPair.of p.fr⁻¹) := succ_nth_stream_eq_some_iff.mpr ⟨p, h, h', rfl⟩ /-- The stream of `IntFractPair`s of an integer stops after the first term. -/ theorem stream_succ_of_int [IsStrictOrderedRing K] (a : ℤ) (n : ℕ) : IntFractPair.stream (a : K) (n + 1) = none := by induction n with \| zero => refine IntFractPair.stream_eq_none_of_fr_eq_zero (IntFractPair.stream_zero (a : K)) ?_ simp only [IntFractPair.of, Int.fract_intCast] \| succ n ih => exact IntFractPair.succ_nth_stream_eq_none_iff.mpr (Or.inl ih) theorem exists_succ_nth_stream_of_fr_zero {ifp_succ_n : IntFractPair K} (stream_succ_nth_eq : IntFractPair.stream v (n + 1) = some ifp_succ_n) (succ_nth_fr_eq_zero : ifp_succ_n.fr = 0) : ∃ ifp_n : IntFractPair K, IntFractPair.stream v n = some ifp_n ∧ ifp_n.fr⁻¹ = ⌊ifp_n.fr⁻¹⌋ := by -- get the witness from `succ_nth_stream_eq_some_iff` and prove that it has the additional -- properties rcases succ_nth_stream_eq_some_iff.mp stream_succ_nth_eq with ⟨ifp_n, seq_nth_eq, _, rfl⟩ refine ⟨ifp_n, seq_nth_eq, ?_⟩ simpa only [IntFractPair.of, Int.fract, sub_eq_zero] using succ_nth_fr_eq_zero /-- A recurrence relation that expresses the `(n+1)`th term of the stream of `IntFractPair`s of `v` for non-integer `v` in terms of the `n`th term of the stream associated to the inverse of the fractional part of `v`. -/ theorem stream_succ (h : Int.fract v ≠ 0) (n : ℕ) : IntFractPair.stream v (n + 1) = IntFractPair.stream (Int.fract v)⁻¹ n := by induction n with \| zero => have H : (IntFractPair.of v).fr = Int.fract v := by simp [IntFractPair.of] rw [stream_zero, stream_succ_of_some (stream_zero v) (ne_of_eq_of_ne H h), H] \| succ n ih => rcases eq_or_ne (IntFractPair.stream (Int.fract v)⁻¹ n) none with hnone \| hsome · rw [hnone] at ih rw [succ_nth_stream_eq_none_iff.mpr (Or.inl hnone), succ_nth_stream_eq_none_iff.mpr (Or.inl ih)] · obtain ⟨p, hp⟩ := Option.ne_none_iff_exists'.mp hsome rw [hp] at ih rcases eq_or_ne p.fr 0 with hz \| hnz · rw [stream_eq_none_of_fr_eq_zero hp hz, stream_eq_none_of_fr_eq_zero ih hz] · rw [stream_succ_of_some hp hnz, stream_succ_of_some ih hnz] end IntFractPair section Head /-! ### Translation of the Head Term Here we state some lemmas that show us that the head term of the computed continued fraction of a value `v` is `⌊v⌋` and how this head term is moved along the structures used in the computation process. -/ /-- The head term of the sequence with head of `v` is just the integer part of `v`. -/ @[simp] theorem IntFractPair.seq1_fst_eq_of : (IntFractPair.seq1 v).fst = IntFractPair.of v := rfl theorem of_h_eq_intFractPair_seq1_fst_b : (of v).h = (IntFractPair.seq1 v).fst.b := by cases aux_seq_eq : IntFractPair.seq1 v simp [of, aux_seq_eq] /-- The head term of the gcf of `v` is `⌊v⌋`. -/ @[simp] theorem of_h_eq_floor : (of v).h = ⌊v⌋ := by simp [of_h_eq_intFractPair_seq1_fst_b, IntFractPair.of] end Head section sequence	/-! ### Translation of the Sequences	Mathlib/Algebra/ContinuedFractions/Computation/Translations.lean	170	171
/- 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.Limits.Shapes.FiniteProducts import Mathlib.CategoryTheory.Limits.Shapes.Kernels import Mathlib.CategoryTheory.Limits.Shapes.NormalMono.Equalizers import Mathlib.CategoryTheory.Abelian.Images import Mathlib.CategoryTheory.Preadditive.Basic /-! # Every NonPreadditiveAbelian category is preadditive In mathlib, we define an abelian category as a preadditive category with a zero object, kernels and cokernels, products and coproducts and in which every monomorphism and epimorphism is normal. While virtually every interesting abelian category has a natural preadditive structure (which is why it is included in the definition), preadditivity is not actually needed: Every category that has all of the other properties appearing in the definition of an abelian category admits a preadditive structure. This is the construction we carry out in this file. The proof proceeds in roughly five steps: 1. Prove some results (for example that all equalizers exist) that would be trivial if we already had the preadditive structure but are a bit of work without it. 2. Develop images and coimages to show that every monomorphism is the kernel of its cokernel. The results of the first two steps are also useful for the "normal" development of abelian categories, and will be used there. 3. For every object `A`, define a "subtraction" morphism `σ : A ⨯ A ⟶ A` and use it to define subtraction on morphisms as `f - g := prod.lift f g ≫ σ`. 4. Prove a small number of identities about this subtraction from the definition of `σ`. 5. From these identities, prove a large number of other identities that imply that defining `f + g := f - (0 - g)` indeed gives an abelian group structure on morphisms such that composition is bilinear. The construction is non-trivial and it is quite remarkable that this abelian group structure can be constructed purely from the existence of a few limits and colimits. Even more remarkably, since abelian categories admit exactly one preadditive structure (see `subsingletonPreadditiveOfHasBinaryBiproducts`), the construction manages to exactly reconstruct any natural preadditive structure the category may have. ## References * [F. Borceux, Handbook of Categorical Algebra 2][borceux-vol2] -/ noncomputable section open CategoryTheory open CategoryTheory.Limits namespace CategoryTheory section universe v u variable (C : Type u) [Category.{v} C] /-- We call a category `NonPreadditiveAbelian` if it has a zero object, kernels, cokernels, binary products and coproducts, and every monomorphism and every epimorphism is normal. -/ class NonPreadditiveAbelian extends HasZeroMorphisms C, IsNormalMonoCategory C, IsNormalEpiCategory C where [has_zero_object : HasZeroObject C] [has_kernels : HasKernels C] [has_cokernels : HasCokernels C] [has_finite_products : HasFiniteProducts C] [has_finite_coproducts : HasFiniteCoproducts C] attribute [instance] NonPreadditiveAbelian.has_zero_object attribute [instance] NonPreadditiveAbelian.has_kernels attribute [instance] NonPreadditiveAbelian.has_cokernels attribute [instance] NonPreadditiveAbelian.has_finite_products attribute [instance] NonPreadditiveAbelian.has_finite_coproducts end end CategoryTheory open CategoryTheory universe v u variable {C : Type u} [Category.{v} C] [NonPreadditiveAbelian C] namespace CategoryTheory.NonPreadditiveAbelian section Factor variable {P Q : C} (f : P ⟶ Q) /-- The map `p : P ⟶ image f` is an epimorphism -/ instance : Epi (Abelian.factorThruImage f) := let I := Abelian.image f let p := Abelian.factorThruImage f let i := kernel.ι (cokernel.π f) -- It will suffice to consider some g : I ⟶ R such that p ≫ g = 0 and show that g = 0. NormalMonoCategory.epi_of_zero_cancel _ fun R (g : I ⟶ R) (hpg : p ≫ g = 0) => by -- Since C is abelian, u := ker g ≫ i is the kernel of some morphism h. let u := kernel.ι g ≫ i haveI hu := normalMonoOfMono u let h := hu.g -- By hypothesis, p factors through the kernel of g via some t. obtain ⟨t, ht⟩ := kernel.lift' g p hpg have fh : f ≫ h = 0 := calc f ≫ h = (p ≫ i) ≫ h := (Abelian.image.fac f).symm ▸ rfl _ = ((t ≫ kernel.ι g) ≫ i) ≫ h := ht ▸ rfl _ = t ≫ u ≫ h := by simp only [u, Category.assoc] _ = t ≫ 0 := hu.w ▸ rfl _ = 0 := HasZeroMorphisms.comp_zero _ _ -- h factors through the cokernel of f via some l. obtain ⟨l, hl⟩ := cokernel.desc' f h fh have hih : i ≫ h = 0 := calc i ≫ h = i ≫ cokernel.π f ≫ l := hl ▸ rfl _ = 0 ≫ l := by rw [← Category.assoc, kernel.condition] _ = 0 := zero_comp -- i factors through u = ker h via some s. obtain ⟨s, hs⟩ := NormalMono.lift' u i hih have hs' : (s ≫ kernel.ι g) ≫ i = 𝟙 I ≫ i := by rw [Category.assoc, hs, Category.id_comp] haveI : Epi (kernel.ι g) := epi_of_epi_fac ((cancel_mono _).1 hs') -- ker g is an epimorphism, but ker g ≫ g = 0 = ker g ≫ 0, so g = 0 as required. exact zero_of_epi_comp _ (kernel.condition g) instance isIso_factorThruImage [Mono f] : IsIso (Abelian.factorThruImage f) := isIso_of_mono_of_epi <\| Abelian.factorThruImage f /-- The canonical morphism `i : coimage f ⟶ Q` is a monomorphism -/ instance : Mono (Abelian.factorThruCoimage f) := let I := Abelian.coimage f let i := Abelian.factorThruCoimage f let p := cokernel.π (kernel.ι f) NormalEpiCategory.mono_of_cancel_zero _ fun R (g : R ⟶ I) (hgi : g ≫ i = 0) => by -- Since C is abelian, u := p ≫ coker g is the cokernel of some morphism h. let u := p ≫ cokernel.π g haveI hu := normalEpiOfEpi u let h := hu.g -- By hypothesis, i factors through the cokernel of g via some t. obtain ⟨t, ht⟩ := cokernel.desc' g i hgi have hf : h ≫ f = 0 := calc h ≫ f = h ≫ p ≫ i := (Abelian.coimage.fac f).symm ▸ rfl _ = h ≫ p ≫ cokernel.π g ≫ t := ht ▸ rfl _ = h ≫ u ≫ t := by simp only [u, Category.assoc] _ = 0 ≫ t := by rw [← Category.assoc, hu.w] _ = 0 := zero_comp -- h factors through the kernel of f via some l. obtain ⟨l, hl⟩ := kernel.lift' f h hf have hhp : h ≫ p = 0 := calc h ≫ p = (l ≫ kernel.ι f) ≫ p := hl ▸ rfl _ = l ≫ 0 := by rw [Category.assoc, cokernel.condition] _ = 0 := comp_zero -- p factors through u = coker h via some s. obtain ⟨s, hs⟩ := NormalEpi.desc' u p hhp have hs' : p ≫ cokernel.π g ≫ s = p ≫ 𝟙 I := by rw [← Category.assoc, hs, Category.comp_id] haveI : Mono (cokernel.π g) := mono_of_mono_fac ((cancel_epi _).1 hs') -- coker g is a monomorphism, but g ≫ coker g = 0 = 0 ≫ coker g, so g = 0 as required. exact zero_of_comp_mono _ (cokernel.condition g) instance isIso_factorThruCoimage [Epi f] : IsIso (Abelian.factorThruCoimage f) := isIso_of_mono_of_epi _ end Factor section CokernelOfKernel variable {X Y : C} {f : X ⟶ Y} /-- In a `NonPreadditiveAbelian` category, an epi is the cokernel of its kernel. More precisely: If `f` is an epimorphism and `s` is some limit kernel cone on `f`, then `f` is a cokernel of `Fork.ι s`. -/ def epiIsCokernelOfKernel [Epi f] (s : Fork f 0) (h : IsLimit s) : IsColimit (CokernelCofork.ofπ f (KernelFork.condition s)) := IsCokernel.cokernelIso _ _ (cokernel.ofIsoComp _ _ (Limits.IsLimit.conePointUniqueUpToIso (limit.isLimit _) h) (ConeMorphism.w (Limits.IsLimit.uniqueUpToIso (limit.isLimit _) h).hom _)) (asIso <\| Abelian.factorThruCoimage f) (Abelian.coimage.fac f) /-- In a `NonPreadditiveAbelian` category, a mono is the kernel of its cokernel. More precisely: If `f` is a monomorphism and `s` is some colimit cokernel cocone on `f`, then `f` is a kernel of `Cofork.π s`. -/ def monoIsKernelOfCokernel [Mono f] (s : Cofork f 0) (h : IsColimit s) : IsLimit (KernelFork.ofι f (CokernelCofork.condition s)) := IsKernel.isoKernel _ _ (kernel.ofCompIso _ _ (Limits.IsColimit.coconePointUniqueUpToIso h (colimit.isColimit _)) (CoconeMorphism.w (Limits.IsColimit.uniqueUpToIso h <\| colimit.isColimit _).hom _)) (asIso <\| Abelian.factorThruImage f) (Abelian.image.fac f) end CokernelOfKernel section /-- The composite `A ⟶ A ⨯ A ⟶ cokernel (Δ A)`, where the first map is `(𝟙 A, 0)` and the second map is the canonical projection into the cokernel. -/ abbrev r (A : C) : A ⟶ cokernel (diag A) := prod.lift (𝟙 A) 0 ≫ cokernel.π (diag A) instance mono_Δ {A : C} : Mono (diag A) := mono_of_mono_fac <\| prod.lift_fst _ _ instance mono_r {A : C} : Mono (r A) := by let hl : IsLimit (KernelFork.ofι (diag A) (cokernel.condition (diag A))) := monoIsKernelOfCokernel _ (colimit.isColimit _) apply NormalEpiCategory.mono_of_cancel_zero intro Z x hx have hxx : (x ≫ prod.lift (𝟙 A) (0 : A ⟶ A)) ≫ cokernel.π (diag A) = 0 := by rw [Category.assoc, hx] obtain ⟨y, hy⟩ := KernelFork.IsLimit.lift' hl _ hxx rw [KernelFork.ι_ofι] at hy have hyy : y = 0 := by erw [← Category.comp_id y, ← Limits.prod.lift_snd (𝟙 A) (𝟙 A), ← Category.assoc, hy, Category.assoc, prod.lift_snd, HasZeroMorphisms.comp_zero] haveI : Mono (prod.lift (𝟙 A) (0 : A ⟶ A)) := mono_of_mono_fac (prod.lift_fst _ _) apply (cancel_mono (prod.lift (𝟙 A) (0 : A ⟶ A))).1 rw [← hy, hyy, zero_comp, zero_comp] instance epi_r {A : C} : Epi (r A) := by have hlp : prod.lift (𝟙 A) (0 : A ⟶ A) ≫ Limits.prod.snd = 0 := prod.lift_snd _ _ let hp1 : IsLimit (KernelFork.ofι (prod.lift (𝟙 A) (0 : A ⟶ A)) hlp) := by refine Fork.IsLimit.mk _ (fun s => Fork.ι s ≫ Limits.prod.fst) ?_ ?_ · intro s apply Limits.prod.hom_ext <;> simp · intro s m h haveI : Mono (prod.lift (𝟙 A) (0 : A ⟶ A)) := mono_of_mono_fac (prod.lift_fst _ _) apply (cancel_mono (prod.lift (𝟙 A) (0 : A ⟶ A))).1 convert h apply Limits.prod.hom_ext <;> simp let hp2 : IsColimit (CokernelCofork.ofπ (Limits.prod.snd : A ⨯ A ⟶ A) hlp) := epiIsCokernelOfKernel _ hp1 apply NormalMonoCategory.epi_of_zero_cancel intro Z z hz have h : prod.lift (𝟙 A) (0 : A ⟶ A) ≫ cokernel.π (diag A) ≫ z = 0 := by rw [← Category.assoc, hz] obtain ⟨t, ht⟩ := CokernelCofork.IsColimit.desc' hp2 _ h rw [CokernelCofork.π_ofπ] at ht have htt : t = 0 := by rw [← Category.id_comp t] change 𝟙 A ≫ t = 0 rw [← Limits.prod.lift_snd (𝟙 A) (𝟙 A), Category.assoc, ht, ← Category.assoc, cokernel.condition, zero_comp] apply (cancel_epi (cokernel.π (diag A))).1 rw [← ht, htt, comp_zero, comp_zero] instance isIso_r {A : C} : IsIso (r A) := isIso_of_mono_of_epi _ /-- The composite `A ⨯ A ⟶ cokernel (diag A) ⟶ A` given by the natural projection into the cokernel followed by the inverse of `r`. In the category of modules, using the normal kernels and cokernels, this map is equal to the map `(a, b) ↦ a - b`, hence the name `σ` for "subtraction". -/ abbrev σ {A : C} : A ⨯ A ⟶ A := cokernel.π (diag A) ≫ inv (r A) end @[reassoc] theorem diag_σ {X : C} : diag X ≫ σ = 0 := by rw [cokernel.condition_assoc, zero_comp] @[reassoc (attr := simp)] theorem lift_σ {X : C} : prod.lift (𝟙 X) 0 ≫ σ = 𝟙 X := by rw [← Category.assoc, IsIso.hom_inv_id] @[reassoc] theorem lift_map {X Y : C} (f : X ⟶ Y) : prod.lift (𝟙 X) 0 ≫ Limits.prod.map f f = f ≫ prod.lift (𝟙 Y) 0 := by simp /-- σ is a cokernel of Δ X. -/ def isColimitσ {X : C} : IsColimit (CokernelCofork.ofπ (σ : X ⨯ X ⟶ X) diag_σ) := cokernel.cokernelIso _ σ (asIso (r X)).symm (by rw [Iso.symm_hom, asIso_inv]) /-- This is the key identity satisfied by `σ`. -/ theorem σ_comp {X Y : C} (f : X ⟶ Y) : σ ≫ f = Limits.prod.map f f ≫ σ := by obtain ⟨g, hg⟩ := CokernelCofork.IsColimit.desc' isColimitσ (Limits.prod.map f f ≫ σ) (by rw [prod.diag_map_assoc, diag_σ, comp_zero]) suffices hfg : f = g by rw [← hg, Cofork.π_ofπ, hfg] calc f = f ≫ prod.lift (𝟙 Y) 0 ≫ σ := by rw [lift_σ, Category.comp_id] _ = prod.lift (𝟙 X) 0 ≫ Limits.prod.map f f ≫ σ := by rw [lift_map_assoc] _ = prod.lift (𝟙 X) 0 ≫ σ ≫ g := by rw [← hg, CokernelCofork.π_ofπ] _ = g := by rw [← Category.assoc, lift_σ, Category.id_comp] section -- We write `f - g` for `prod.lift f g ≫ σ`. /-- Subtraction of morphisms in a `NonPreadditiveAbelian` category. -/ def hasSub {X Y : C} : Sub (X ⟶ Y) := ⟨fun f g => prod.lift f g ≫ σ⟩ attribute [local instance] hasSub -- We write `-f` for `0 - f`. /-- Negation of morphisms in a `NonPreadditiveAbelian` category. -/ def hasNeg {X Y : C} : Neg (X ⟶ Y) where neg := fun f => 0 - f attribute [local instance] hasNeg -- We write `f + g` for `f - (-g)`. /-- Addition of morphisms in a `NonPreadditiveAbelian` category. -/ def hasAdd {X Y : C} : Add (X ⟶ Y) := ⟨fun f g => f - -g⟩ attribute [local instance] hasAdd theorem sub_def {X Y : C} (a b : X ⟶ Y) : a - b = prod.lift a b ≫ σ := rfl theorem add_def {X Y : C} (a b : X ⟶ Y) : a + b = a - -b := rfl theorem neg_def {X Y : C} (a : X ⟶ Y) : -a = 0 - a := rfl theorem sub_zero {X Y : C} (a : X ⟶ Y) : a - 0 = a := by rw [sub_def] conv_lhs => congr; congr; rw [← Category.comp_id a] case a.g => rw [show 0 = a ≫ (0 : Y ⟶ Y) by simp] rw [← prod.comp_lift, Category.assoc, lift_σ, Category.comp_id] theorem sub_self {X Y : C} (a : X ⟶ Y) : a - a = 0 := by rw [sub_def, ← Category.comp_id a, ← prod.comp_lift, Category.assoc, diag_σ, comp_zero] theorem lift_sub_lift {X Y : C} (a b c d : X ⟶ Y) : prod.lift a b - prod.lift c d = prod.lift (a - c) (b - d) := by simp only [sub_def] ext · rw [Category.assoc, σ_comp, prod.lift_map_assoc, prod.lift_fst, prod.lift_fst, prod.lift_fst] · rw [Category.assoc, σ_comp, prod.lift_map_assoc, prod.lift_snd, prod.lift_snd, prod.lift_snd] theorem sub_sub_sub {X Y : C} (a b c d : X ⟶ Y) : a - c - (b - d) = a - b - (c - d) := by rw [sub_def, ← lift_sub_lift, sub_def, Category.assoc, σ_comp, prod.lift_map_assoc]; rfl theorem neg_sub {X Y : C} (a b : X ⟶ Y) : -a - b = -b - a := by conv_lhs => rw [neg_def, ← sub_zero b, sub_sub_sub, sub_zero, ← neg_def] theorem neg_neg {X Y : C} (a : X ⟶ Y) : - -a = a := by rw [neg_def, neg_def] conv_lhs => congr; rw [← sub_self a] rw [sub_sub_sub, sub_zero, sub_self, sub_zero] theorem add_comm {X Y : C} (a b : X ⟶ Y) : a + b = b + a := by rw [add_def] conv_lhs => rw [← neg_neg a] rw [neg_def, neg_def, neg_def, sub_sub_sub] conv_lhs => congr next => skip rw [← neg_def, neg_sub] rw [sub_sub_sub, add_def, ← neg_def, neg_neg b, neg_def] theorem add_neg {X Y : C} (a b : X ⟶ Y) : a + -b = a - b := by rw [add_def, neg_neg] theorem add_neg_cancel {X Y : C} (a : X ⟶ Y) : a + -a = 0 := by rw [add_neg, sub_self] theorem neg_add_cancel {X Y : C} (a : X ⟶ Y) : -a + a = 0 := by rw [add_comm, add_neg_cancel] theorem neg_sub' {X Y : C} (a b : X ⟶ Y) : -(a - b) = -a + b := by rw [neg_def, neg_def] conv_lhs => rw [← sub_self (0 : X ⟶ Y)] rw [sub_sub_sub, add_def, neg_def] theorem neg_add {X Y : C} (a b : X ⟶ Y) : -(a + b) = -a - b := by rw [add_def, neg_sub', add_neg] theorem sub_add {X Y : C} (a b c : X ⟶ Y) : a - b + c = a - (b - c) := by rw [add_def, neg_def, sub_sub_sub, sub_zero] theorem add_assoc {X Y : C} (a b c : X ⟶ Y) : a + b + c = a + (b + c) := by conv_lhs => congr; rw [add_def] rw [sub_add, ← add_neg, neg_sub', neg_neg] theorem add_zero {X Y : C} (a : X ⟶ Y) : a + 0 = a := by rw [add_def, neg_def, sub_self, sub_zero] theorem comp_sub {X Y Z : C} (f : X ⟶ Y) (g h : Y ⟶ Z) : f ≫ (g - h) = f ≫ g - f ≫ h := by rw [sub_def, ← Category.assoc, prod.comp_lift, sub_def] theorem sub_comp {X Y Z : C} (f g : X ⟶ Y) (h : Y ⟶ Z) : (f - g) ≫ h = f ≫ h - g ≫ h := by rw [sub_def, Category.assoc, σ_comp, ← Category.assoc, prod.lift_map, sub_def] theorem comp_add (X Y Z : C) (f : X ⟶ Y) (g h : Y ⟶ Z) : f ≫ (g + h) = f ≫ g + f ≫ h := by rw [add_def, comp_sub, neg_def, comp_sub, comp_zero, add_def, neg_def] theorem add_comp (X Y Z : C) (f g : X ⟶ Y) (h : Y ⟶ Z) : (f + g) ≫ h = f ≫ h + g ≫ h := by rw [add_def, sub_comp, neg_def, sub_comp, zero_comp, add_def, neg_def] /-- Every `NonPreadditiveAbelian` category is preadditive. -/ def preadditive : Preadditive C where homGroup X Y := { add := (· + ·) add_assoc := add_assoc zero := 0 zero_add := neg_neg add_zero := add_zero	neg := fun f => -f neg_add_cancel := neg_add_cancel sub_eq_add_neg := fun f g => (add_neg f g).symm -- Porting note: autoParam failed add_comm := add_comm	Mathlib/CategoryTheory/Abelian/NonPreadditive.lean	405	408
/- Copyright (c) 2015 Microsoft Corporation. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Data.Multiset.ZeroCons /-! # Basic results on multisets -/ -- No algebra should be required assert_not_exists Monoid universe v open List Subtype Nat Function variable {α : Type} {β : Type v} {γ : Type} namespace Multiset /-! ### `Multiset.toList` -/ section ToList /-- Produces a list of the elements in the multiset using choice. -/ noncomputable def toList (s : Multiset α) := s.out @[simp, norm_cast] theorem coe_toList (s : Multiset α) : (s.toList : Multiset α) = s := s.out_eq' @[simp] theorem toList_eq_nil {s : Multiset α} : s.toList = [] ↔ s = 0 := by rw [← coe_eq_zero, coe_toList] theorem empty_toList {s : Multiset α} : s.toList.isEmpty ↔ s = 0 := by simp @[simp] theorem toList_zero : (Multiset.toList 0 : List α) = [] := toList_eq_nil.mpr rfl @[simp] theorem mem_toList {a : α} {s : Multiset α} : a ∈ s.toList ↔ a ∈ s := by rw [← mem_coe, coe_toList] @[simp] theorem toList_eq_singleton_iff {a : α} {m : Multiset α} : m.toList = [a] ↔ m = {a} := by rw [← perm_singleton, ← coe_eq_coe, coe_toList, coe_singleton] @[simp] theorem toList_singleton (a : α) : ({a} : Multiset α).toList = [a] := Multiset.toList_eq_singleton_iff.2 rfl @[simp] theorem length_toList (s : Multiset α) : s.toList.length = card s := by rw [← coe_card, coe_toList] end ToList /-! ### Induction principles -/ /-- The strong induction principle for multisets. -/ @[elab_as_elim] def strongInductionOn {p : Multiset α → Sort} (s : Multiset α) (ih : ∀ s, (∀ t < s, p t) → p s) : p s := (ih s) fun t _h => strongInductionOn t ih termination_by card s decreasing_by exact card_lt_card _h theorem strongInductionOn_eq {p : Multiset α → Sort} (s : Multiset α) (H) : @strongInductionOn _ p s H = H s fun t _h => @strongInductionOn _ p t H := by rw [strongInductionOn] @[elab_as_elim] theorem case_strongInductionOn {p : Multiset α → Prop} (s : Multiset α) (h₀ : p 0) (h₁ : ∀ a s, (∀ t ≤ s, p t) → p (a ::ₘ s)) : p s := Multiset.strongInductionOn s fun s => Multiset.induction_on s (fun _ => h₀) fun _a _s _ ih => (h₁ _ _) fun _t h => ih _ <\| lt_of_le_of_lt h <\| lt_cons_self _ _ /-- Suppose that, given that `p t` can be defined on all supersets of `s` of cardinality less than `n`, one knows how to define `p s`. Then one can inductively define `p s` for all multisets `s` of cardinality less than `n`, starting from multisets of card `n` and iterating. This can be used either to define data, or to prove properties. -/ def strongDownwardInduction {p : Multiset α → Sort} {n : ℕ} (H : ∀ t₁, (∀ {t₂ : Multiset α}, card t₂ ≤ n → t₁ < t₂ → p t₂) → card t₁ ≤ n → p t₁) (s : Multiset α) : card s ≤ n → p s := H s fun {t} ht _h => strongDownwardInduction H t ht termination_by n - card s decreasing_by simp_wf; have := (card_lt_card _h); omega theorem strongDownwardInduction_eq {p : Multiset α → Sort} {n : ℕ} (H : ∀ t₁, (∀ {t₂ : Multiset α}, card t₂ ≤ n → t₁ < t₂ → p t₂) → card t₁ ≤ n → p t₁) (s : Multiset α) : strongDownwardInduction H s = H s fun ht _hst => strongDownwardInduction H _ ht := by rw [strongDownwardInduction] /-- Analogue of `strongDownwardInduction` with order of arguments swapped. -/ @[elab_as_elim] def strongDownwardInductionOn {p : Multiset α → Sort} {n : ℕ} : ∀ s : Multiset α, (∀ t₁, (∀ {t₂ : Multiset α}, card t₂ ≤ n → t₁ < t₂ → p t₂) → card t₁ ≤ n → p t₁) → card s ≤ n → p s := fun s H => strongDownwardInduction H s theorem strongDownwardInductionOn_eq {p : Multiset α → Sort} (s : Multiset α) {n : ℕ} (H : ∀ t₁, (∀ {t₂ : Multiset α}, card t₂ ≤ n → t₁ < t₂ → p t₂) → card t₁ ≤ n → p t₁) : s.strongDownwardInductionOn H = H s fun {t} ht _h => t.strongDownwardInductionOn H ht := by dsimp only [strongDownwardInductionOn] rw [strongDownwardInduction] section Choose variable (p : α → Prop) [DecidablePred p] (l : Multiset α) /-- Given a proof `hp` that there exists a unique `a ∈ l` such that `p a`, `chooseX p l hp` returns that `a` together with proofs of `a ∈ l` and `p a`. -/ def chooseX : ∀ _hp : ∃! a, a ∈ l ∧ p a, { a // a ∈ l ∧ p a } := Quotient.recOn l (fun l' ex_unique => List.chooseX p l' (ExistsUnique.exists ex_unique)) (by intros a b _ funext hp suffices all_equal : ∀ x y : { t // t ∈ b ∧ p t }, x = y by apply all_equal rintro ⟨x, px⟩ ⟨y, py⟩ rcases hp with ⟨z, ⟨_z_mem_l, _pz⟩, z_unique⟩ congr calc x = z := z_unique x px _ = y := (z_unique y py).symm ) /-- Given a proof `hp` that there exists a unique `a ∈ l` such that `p a`, `choose p l hp` returns that `a`. -/ 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 variable (α) in /-- The equivalence between lists and multisets of a subsingleton type. -/ def subsingletonEquiv [Subsingleton α] : List α ≃ Multiset α where toFun := ofList invFun := (Quot.lift id) fun (a b : List α) (h : a ~ b) => (List.ext_get h.length_eq) fun _ _ _ => Subsingleton.elim _ _ left_inv _ := rfl right_inv m := Quot.inductionOn m fun _ => rfl @[simp] theorem coe_subsingletonEquiv [Subsingleton α] : (subsingletonEquiv α : List α → Multiset α) = ofList := rfl section SizeOf 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 : Multiset α} (hx : x ∈ s) : SizeOf.sizeOf x < SizeOf.sizeOf s := by induction s using Quot.inductionOn exact List.sizeOf_lt_sizeOf_of_mem hx end SizeOf end Multiset		Mathlib/Data/Multiset/Basic.lean	741	745
/- Copyright (c) 2021 Frédéric Dupuis. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Frédéric Dupuis, Heather Macbeth -/ import Mathlib.Analysis.InnerProductSpace.Dual import Mathlib.Analysis.InnerProductSpace.PiL2 /-! # Adjoint of operators on Hilbert spaces Given an operator `A : E →L[𝕜] F`, where `E` and `F` are Hilbert spaces, its adjoint `adjoint A : F →L[𝕜] E` is the unique operator such that `⟪x, A y⟫ = ⟪adjoint A x, y⟫` for all `x` and `y`. We then use this to put a C⋆-algebra structure on `E →L[𝕜] E` with the adjoint as the star operation. This construction is used to define an adjoint for linear maps (i.e. not continuous) between finite dimensional spaces. ## Main definitions * `ContinuousLinearMap.adjoint : (E →L[𝕜] F) ≃ₗᵢ⋆[𝕜] (F →L[𝕜] E)`: the adjoint of a continuous linear map, bundled as a conjugate-linear isometric equivalence. * `LinearMap.adjoint : (E →ₗ[𝕜] F) ≃ₗ⋆[𝕜] (F →ₗ[𝕜] E)`: the adjoint of a linear map between finite-dimensional spaces, this time only as a conjugate-linear equivalence, since there is no norm defined on these maps. ## Implementation notes * The continuous conjugate-linear version `adjointAux` is only an intermediate definition and is not meant to be used outside this file. ## Tags adjoint -/ noncomputable section open RCLike open scoped ComplexConjugate variable {𝕜 E F G : Type} [RCLike 𝕜] variable [NormedAddCommGroup E] [NormedAddCommGroup F] [NormedAddCommGroup G] variable [InnerProductSpace 𝕜 E] [InnerProductSpace 𝕜 F] [InnerProductSpace 𝕜 G] local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y /-! ### Adjoint operator -/ open InnerProductSpace namespace ContinuousLinearMap variable [CompleteSpace E] [CompleteSpace G] -- Note: made noncomputable to stop excess compilation -- https://github.com/leanprover-community/mathlib4/issues/7103 /-- The adjoint, as a continuous conjugate-linear map. This is only meant as an auxiliary definition for the main definition `adjoint`, where this is bundled as a conjugate-linear isometric equivalence. -/ noncomputable def adjointAux : (E →L[𝕜] F) →L⋆[𝕜] F →L[𝕜] E := (ContinuousLinearMap.compSL _ _ _ _ _ ((toDual 𝕜 E).symm : NormedSpace.Dual 𝕜 E →L⋆[𝕜] E)).comp (toSesqForm : (E →L[𝕜] F) →L[𝕜] F →L⋆[𝕜] NormedSpace.Dual 𝕜 E) @[simp] theorem adjointAux_apply (A : E →L[𝕜] F) (x : F) : adjointAux A x = ((toDual 𝕜 E).symm : NormedSpace.Dual 𝕜 E → E) ((toSesqForm A) x) := rfl theorem adjointAux_inner_left (A : E →L[𝕜] F) (x : E) (y : F) : ⟪adjointAux A y, x⟫ = ⟪y, A x⟫ := by rw [adjointAux_apply, toDual_symm_apply, toSesqForm_apply_coe, coe_comp', innerSL_apply_coe, Function.comp_apply] theorem adjointAux_inner_right (A : E →L[𝕜] F) (x : E) (y : F) : ⟪x, adjointAux A y⟫ = ⟪A x, y⟫ := by rw [← inner_conj_symm, adjointAux_inner_left, inner_conj_symm] variable [CompleteSpace F] theorem adjointAux_adjointAux (A : E →L[𝕜] F) : adjointAux (adjointAux A) = A := by ext v refine ext_inner_left 𝕜 fun w => ?_ rw [adjointAux_inner_right, adjointAux_inner_left] @[simp] theorem adjointAux_norm (A : E →L[𝕜] F) : ‖adjointAux A‖ = ‖A‖ := by refine le_antisymm ?_ ?_ · refine ContinuousLinearMap.opNorm_le_bound _ (norm_nonneg _) fun x => ?_ rw [adjointAux_apply, LinearIsometryEquiv.norm_map] exact toSesqForm_apply_norm_le · nth_rw 1 [← adjointAux_adjointAux A] refine ContinuousLinearMap.opNorm_le_bound _ (norm_nonneg _) fun x => ?_ rw [adjointAux_apply, LinearIsometryEquiv.norm_map] exact toSesqForm_apply_norm_le /-- The adjoint of a bounded operator `A` from a Hilbert space `E` to another Hilbert space `F`, denoted as `A†`. -/ def adjoint : (E →L[𝕜] F) ≃ₗᵢ⋆[𝕜] F →L[𝕜] E := LinearIsometryEquiv.ofSurjective { adjointAux with norm_map' := adjointAux_norm } fun A => ⟨adjointAux A, adjointAux_adjointAux A⟩ @[inherit_doc] scoped[InnerProduct] postfix:1000 "†" => ContinuousLinearMap.adjoint open InnerProduct /-- The fundamental property of the adjoint. -/ theorem adjoint_inner_left (A : E →L[𝕜] F) (x : E) (y : F) : ⟪(A†) y, x⟫ = ⟪y, A x⟫ := adjointAux_inner_left A x y /-- The fundamental property of the adjoint. -/ theorem adjoint_inner_right (A : E →L[𝕜] F) (x : E) (y : F) : ⟪x, (A†) y⟫ = ⟪A x, y⟫ := adjointAux_inner_right A x y /-- The adjoint is involutive. -/ @[simp] theorem adjoint_adjoint (A : E →L[𝕜] F) : A†† = A := adjointAux_adjointAux A /-- The adjoint of the composition of two operators is the composition of the two adjoints in reverse order. -/ @[simp] theorem adjoint_comp (A : F →L[𝕜] G) (B : E →L[𝕜] F) : (A ∘L B)† = B† ∘L A† := by ext v refine ext_inner_left 𝕜 fun w => ?_ simp only [adjoint_inner_right, ContinuousLinearMap.coe_comp', Function.comp_apply] theorem apply_norm_sq_eq_inner_adjoint_left (A : E →L[𝕜] F) (x : E) : ‖A x‖ ^ 2 = re ⟪(A† ∘L A) x, x⟫ := by have h : ⟪(A† ∘L A) x, x⟫ = ⟪A x, A x⟫ := by rw [← adjoint_inner_left]; rfl rw [h, ← inner_self_eq_norm_sq (𝕜 := 𝕜) _] theorem apply_norm_eq_sqrt_inner_adjoint_left (A : E →L[𝕜] F) (x : E) : ‖A x‖ = √(re ⟪(A† ∘L A) x, x⟫) := by rw [← apply_norm_sq_eq_inner_adjoint_left, Real.sqrt_sq (norm_nonneg _)] theorem apply_norm_sq_eq_inner_adjoint_right (A : E →L[𝕜] F) (x : E) : ‖A x‖ ^ 2 = re ⟪x, (A† ∘L A) x⟫ := by have h : ⟪x, (A† ∘L A) x⟫ = ⟪A x, A x⟫ := by rw [← adjoint_inner_right]; rfl rw [h, ← inner_self_eq_norm_sq (𝕜 := 𝕜) _] theorem apply_norm_eq_sqrt_inner_adjoint_right (A : E →L[𝕜] F) (x : E) : ‖A x‖ = √(re ⟪x, (A† ∘L A) x⟫) := by rw [← apply_norm_sq_eq_inner_adjoint_right, Real.sqrt_sq (norm_nonneg _)] /-- The adjoint is unique: a map `A` is the adjoint of `B` iff it satisfies `⟪A x, y⟫ = ⟪x, B y⟫` for all `x` and `y`. -/ theorem eq_adjoint_iff (A : E →L[𝕜] F) (B : F →L[𝕜] E) : A = B† ↔ ∀ x y, ⟪A x, y⟫ = ⟪x, B y⟫ := by refine ⟨fun h x y => by rw [h, adjoint_inner_left], fun h => ?_⟩ ext x exact ext_inner_right 𝕜 fun y => by simp only [adjoint_inner_left, h x y] @[simp] theorem adjoint_id : ContinuousLinearMap.adjoint (ContinuousLinearMap.id 𝕜 E) = ContinuousLinearMap.id 𝕜 E := by refine Eq.symm ?_ rw [eq_adjoint_iff] simp theorem _root_.Submodule.adjoint_subtypeL (U : Submodule 𝕜 E) [CompleteSpace U] : U.subtypeL† = U.orthogonalProjection := by symm rw [eq_adjoint_iff] intro x u rw [U.coe_inner, U.inner_orthogonalProjection_left_eq_right, U.orthogonalProjection_mem_subspace_eq_self] rfl theorem _root_.Submodule.adjoint_orthogonalProjection (U : Submodule 𝕜 E) [CompleteSpace U] : (U.orthogonalProjection : E →L[𝕜] U)† = U.subtypeL := by rw [← U.adjoint_subtypeL, adjoint_adjoint] /-- `E →L[𝕜] E` is a star algebra with the adjoint as the star operation. -/ instance : Star (E →L[𝕜] E) := ⟨adjoint⟩ instance : InvolutiveStar (E →L[𝕜] E) := ⟨adjoint_adjoint⟩ instance : StarMul (E →L[𝕜] E) := ⟨adjoint_comp⟩ instance : StarRing (E →L[𝕜] E) := ⟨LinearIsometryEquiv.map_add adjoint⟩ instance : StarModule 𝕜 (E →L[𝕜] E) := ⟨LinearIsometryEquiv.map_smulₛₗ adjoint⟩ theorem star_eq_adjoint (A : E →L[𝕜] E) : star A = A† := rfl /-- A continuous linear operator is self-adjoint iff it is equal to its adjoint. -/ theorem isSelfAdjoint_iff' {A : E →L[𝕜] E} : IsSelfAdjoint A ↔ ContinuousLinearMap.adjoint A = A := Iff.rfl theorem norm_adjoint_comp_self (A : E →L[𝕜] F) : ‖ContinuousLinearMap.adjoint A ∘L A‖ = ‖A‖ ‖A‖ := by refine le_antisymm ?_ ?_ · calc ‖A† ∘L A‖ ≤ ‖A†‖ * ‖A‖ := opNorm_comp_le _ _ _ = ‖A‖ * ‖A‖ := by rw [LinearIsometryEquiv.norm_map] · rw [← sq, ← Real.sqrt_le_sqrt_iff (norm_nonneg _), Real.sqrt_sq (norm_nonneg _)] refine opNorm_le_bound _ (Real.sqrt_nonneg _) fun x => ?_ have := calc re ⟪(A† ∘L A) x, x⟫ ≤ ‖(A† ∘L A) x‖ * ‖x‖ := re_inner_le_norm _ _ _ ≤ ‖A† ∘L A‖ * ‖x‖ * ‖x‖ := mul_le_mul_of_nonneg_right (le_opNorm _ _) (norm_nonneg _) calc ‖A x‖ = √(re ⟪(A† ∘L A) x, x⟫) := by rw [apply_norm_eq_sqrt_inner_adjoint_left] _ ≤ √(‖A† ∘L A‖ * ‖x‖ * ‖x‖) := Real.sqrt_le_sqrt this _ = √‖A† ∘L A‖ * ‖x‖ := by simp_rw [mul_assoc, Real.sqrt_mul (norm_nonneg _) (‖x‖ * ‖x‖), Real.sqrt_mul_self (norm_nonneg x)] /-- The C⋆-algebra instance when `𝕜 := ℂ` can be found in `Analysis.CStarAlgebra.ContinuousLinearMap`. -/ instance : CStarRing (E →L[𝕜] E) where norm_mul_self_le x := le_of_eq <\| Eq.symm <\| norm_adjoint_comp_self x theorem isAdjointPair_inner (A : E →L[𝕜] F) : LinearMap.IsAdjointPair (sesqFormOfInner : E →ₗ[𝕜] E →ₗ⋆[𝕜] 𝕜) (sesqFormOfInner : F →ₗ[𝕜] F →ₗ⋆[𝕜] 𝕜) A (A†) := by intro x y simp only [sesqFormOfInner_apply_apply, adjoint_inner_left, coe_coe] end ContinuousLinearMap /-! ### Self-adjoint operators -/ namespace IsSelfAdjoint open ContinuousLinearMap variable [CompleteSpace E] [CompleteSpace F] theorem adjoint_eq {A : E →L[𝕜] E} (hA : IsSelfAdjoint A) : ContinuousLinearMap.adjoint A = A := hA /-- Every self-adjoint operator on an inner product space is symmetric. -/ theorem isSymmetric {A : E →L[𝕜] E} (hA : IsSelfAdjoint A) : (A : E →ₗ[𝕜] E).IsSymmetric := by intro x y rw_mod_cast [← A.adjoint_inner_right, hA.adjoint_eq] /-- Conjugating preserves self-adjointness. -/ theorem conj_adjoint {T : E →L[𝕜] E} (hT : IsSelfAdjoint T) (S : E →L[𝕜] F) : IsSelfAdjoint (S ∘L T ∘L ContinuousLinearMap.adjoint S) := by rw [isSelfAdjoint_iff'] at hT ⊢ simp only [hT, adjoint_comp, adjoint_adjoint] exact ContinuousLinearMap.comp_assoc _ _ _ /-- Conjugating preserves self-adjointness. -/ theorem adjoint_conj {T : E →L[𝕜] E} (hT : IsSelfAdjoint T) (S : F →L[𝕜] E) : IsSelfAdjoint (ContinuousLinearMap.adjoint S ∘L T ∘L S) := by rw [isSelfAdjoint_iff'] at hT ⊢ simp only [hT, adjoint_comp, adjoint_adjoint] exact ContinuousLinearMap.comp_assoc _ _ _ theorem _root_.ContinuousLinearMap.isSelfAdjoint_iff_isSymmetric {A : E →L[𝕜] E} : IsSelfAdjoint A ↔ (A : E →ₗ[𝕜] E).IsSymmetric := ⟨fun hA => hA.isSymmetric, fun hA => ext fun x => ext_inner_right 𝕜 fun y => (A.adjoint_inner_left y x).symm ▸ (hA x y).symm⟩ theorem _root_.LinearMap.IsSymmetric.isSelfAdjoint {A : E →L[𝕜] E} (hA : (A : E →ₗ[𝕜] E).IsSymmetric) : IsSelfAdjoint A := by rwa [← ContinuousLinearMap.isSelfAdjoint_iff_isSymmetric] at hA /-- The orthogonal projection is self-adjoint. -/ theorem _root_.orthogonalProjection_isSelfAdjoint (U : Submodule 𝕜 E) [CompleteSpace U] : IsSelfAdjoint (U.subtypeL ∘L U.orthogonalProjection) := U.orthogonalProjection_isSymmetric.isSelfAdjoint theorem conj_orthogonalProjection {T : E →L[𝕜] E} (hT : IsSelfAdjoint T) (U : Submodule 𝕜 E) [CompleteSpace U] : IsSelfAdjoint (U.subtypeL ∘L U.orthogonalProjection ∘L T ∘L U.subtypeL ∘L U.orthogonalProjection) := by rw [← ContinuousLinearMap.comp_assoc] nth_rw 1 [← (orthogonalProjection_isSelfAdjoint U).adjoint_eq] exact hT.adjoint_conj _ end IsSelfAdjoint namespace LinearMap variable [CompleteSpace E] variable {T : E →ₗ[𝕜] E} /-- The Hellinger--Toeplitz theorem: Construct a self-adjoint operator from an everywhere defined symmetric operator. -/ def IsSymmetric.toSelfAdjoint (hT : IsSymmetric T) : selfAdjoint (E →L[𝕜] E) := ⟨⟨T, hT.continuous⟩, ContinuousLinearMap.isSelfAdjoint_iff_isSymmetric.mpr hT⟩ theorem IsSymmetric.coe_toSelfAdjoint (hT : IsSymmetric T) : (hT.toSelfAdjoint : E →ₗ[𝕜] E) = T := rfl theorem IsSymmetric.toSelfAdjoint_apply (hT : IsSymmetric T) {x : E} : (hT.toSelfAdjoint : E → E) x = T x := rfl end LinearMap namespace LinearMap variable [FiniteDimensional 𝕜 E] [FiniteDimensional 𝕜 F] [FiniteDimensional 𝕜 G] /- Porting note: Lean can't use `FiniteDimensional.complete` since it was generalized to topological vector spaces. Use local instances instead. -/ /-- The adjoint of an operator from the finite-dimensional inner product space `E` to the finite-dimensional inner product space `F`. -/ def adjoint : (E →ₗ[𝕜] F) ≃ₗ⋆[𝕜] F →ₗ[𝕜] E := have := FiniteDimensional.complete 𝕜 E have := FiniteDimensional.complete 𝕜 F /- Note: Instead of the two instances above, the following works: ``` have := FiniteDimensional.complete 𝕜 have := FiniteDimensional.complete 𝕜 ``` But removing one of the `have`s makes it fail. The reason is that `E` and `F` don't live in the same universe, so the first `have` can no longer be used for `F` after its universe metavariable has been assigned to that of `E`! -/ ((LinearMap.toContinuousLinearMap : (E →ₗ[𝕜] F) ≃ₗ[𝕜] E →L[𝕜] F).trans ContinuousLinearMap.adjoint.toLinearEquiv).trans LinearMap.toContinuousLinearMap.symm theorem adjoint_toContinuousLinearMap (A : E →ₗ[𝕜] F) : haveI := FiniteDimensional.complete 𝕜 E haveI := FiniteDimensional.complete 𝕜 F LinearMap.toContinuousLinearMap (LinearMap.adjoint A) = ContinuousLinearMap.adjoint (LinearMap.toContinuousLinearMap A) := rfl theorem adjoint_eq_toCLM_adjoint (A : E →ₗ[𝕜] F) : haveI := FiniteDimensional.complete 𝕜 E haveI := FiniteDimensional.complete 𝕜 F LinearMap.adjoint A = ContinuousLinearMap.adjoint (LinearMap.toContinuousLinearMap A) := rfl /-- The fundamental property of the adjoint. -/ theorem adjoint_inner_left (A : E →ₗ[𝕜] F) (x : E) (y : F) : ⟪adjoint A y, x⟫ = ⟪y, A x⟫ := by haveI := FiniteDimensional.complete 𝕜 E haveI := FiniteDimensional.complete 𝕜 F rw [← coe_toContinuousLinearMap A, adjoint_eq_toCLM_adjoint] exact ContinuousLinearMap.adjoint_inner_left _ x y /-- The fundamental property of the adjoint. -/ theorem adjoint_inner_right (A : E →ₗ[𝕜] F) (x : E) (y : F) : ⟪x, adjoint A y⟫ = ⟪A x, y⟫ := by haveI := FiniteDimensional.complete 𝕜 E haveI := FiniteDimensional.complete 𝕜 F rw [← coe_toContinuousLinearMap A, adjoint_eq_toCLM_adjoint] exact ContinuousLinearMap.adjoint_inner_right _ x y /-- The adjoint is involutive. -/ @[simp] theorem adjoint_adjoint (A : E →ₗ[𝕜] F) : LinearMap.adjoint (LinearMap.adjoint A) = A := by ext v refine ext_inner_left 𝕜 fun w => ?_ rw [adjoint_inner_right, adjoint_inner_left] /-- The adjoint of the composition of two operators is the composition of the two adjoints in reverse order. -/ @[simp] theorem adjoint_comp (A : F →ₗ[𝕜] G) (B : E →ₗ[𝕜] F) : LinearMap.adjoint (A ∘ₗ B) = LinearMap.adjoint B ∘ₗ LinearMap.adjoint A := by ext v refine ext_inner_left 𝕜 fun w => ?_ simp only [adjoint_inner_right, LinearMap.coe_comp, Function.comp_apply] /-- The adjoint is unique: a map `A` is the adjoint of `B` iff it satisfies `⟪A x, y⟫ = ⟪x, B y⟫` for all `x` and `y`. -/ theorem eq_adjoint_iff (A : E →ₗ[𝕜] F) (B : F →ₗ[𝕜] E) : A = LinearMap.adjoint B ↔ ∀ x y, ⟪A x, y⟫ = ⟪x, B y⟫ := by refine ⟨fun h x y => by rw [h, adjoint_inner_left], fun h => ?_⟩ ext x exact ext_inner_right 𝕜 fun y => by simp only [adjoint_inner_left, h x y] /-- The adjoint is unique: a map `A` is the adjoint of `B` iff it satisfies `⟪A x, y⟫ = ⟪x, B y⟫` for all basis vectors `x` and `y`. -/ theorem eq_adjoint_iff_basis {ι₁ : Type} {ι₂ : Type} (b₁ : Basis ι₁ 𝕜 E) (b₂ : Basis ι₂ 𝕜 F) (A : E →ₗ[𝕜] F) (B : F →ₗ[𝕜] E) : A = LinearMap.adjoint B ↔ ∀ (i₁ : ι₁) (i₂ : ι₂), ⟪A (b₁ i₁), b₂ i₂⟫ = ⟪b₁ i₁, B (b₂ i₂)⟫ := by refine ⟨fun h x y => by rw [h, adjoint_inner_left], fun h => ?_⟩ refine Basis.ext b₁ fun i₁ => ?_ exact ext_inner_right_basis b₂ fun i₂ => by simp only [adjoint_inner_left, h i₁ i₂] theorem eq_adjoint_iff_basis_left {ι : Type} (b : Basis ι 𝕜 E) (A : E →ₗ[𝕜] F) (B : F →ₗ[𝕜] E) : A = LinearMap.adjoint B ↔ ∀ i y, ⟪A (b i), y⟫ = ⟪b i, B y⟫ := by refine ⟨fun h x y => by rw [h, adjoint_inner_left], fun h => Basis.ext b fun i => ?_⟩ exact ext_inner_right 𝕜 fun y => by simp only [h i, adjoint_inner_left] theorem eq_adjoint_iff_basis_right {ι : Type} (b : Basis ι 𝕜 F) (A : E →ₗ[𝕜] F) (B : F →ₗ[𝕜] E) : A = LinearMap.adjoint B ↔ ∀ i x, ⟪A x, b i⟫ = ⟪x, B (b i)⟫ := by refine ⟨fun h x y => by rw [h, adjoint_inner_left], fun h => ?_⟩ ext x exact ext_inner_right_basis b fun i => by simp only [h i, adjoint_inner_left] /-- `E →ₗ[𝕜] E` is a star algebra with the adjoint as the star operation. -/ instance : Star (E →ₗ[𝕜] E) := ⟨adjoint⟩ instance : InvolutiveStar (E →ₗ[𝕜] E) := ⟨adjoint_adjoint⟩ instance : StarMul (E →ₗ[𝕜] E) := ⟨adjoint_comp⟩ instance : StarRing (E →ₗ[𝕜] E) := ⟨LinearEquiv.map_add adjoint⟩ instance : StarModule 𝕜 (E →ₗ[𝕜] E) := ⟨LinearEquiv.map_smulₛₗ adjoint⟩ theorem star_eq_adjoint (A : E →ₗ[𝕜] E) : star A = LinearMap.adjoint A := rfl /-- A continuous linear operator is self-adjoint iff it is equal to its adjoint. -/ theorem isSelfAdjoint_iff' {A : E →ₗ[𝕜] E} : IsSelfAdjoint A ↔ LinearMap.adjoint A = A := Iff.rfl theorem isSymmetric_iff_isSelfAdjoint (A : E →ₗ[𝕜] E) : IsSymmetric A ↔ IsSelfAdjoint A := by rw [isSelfAdjoint_iff', IsSymmetric, ← LinearMap.eq_adjoint_iff] exact eq_comm theorem isAdjointPair_inner (A : E →ₗ[𝕜] F) : IsAdjointPair (sesqFormOfInner : E →ₗ[𝕜] E →ₗ⋆[𝕜] 𝕜) (sesqFormOfInner : F →ₗ[𝕜] F →ₗ⋆[𝕜] 𝕜) A (LinearMap.adjoint A) := by intro x y simp only [sesqFormOfInner_apply_apply, adjoint_inner_left] /-- The Gram operator T†T is symmetric. -/ theorem isSymmetric_adjoint_mul_self (T : E →ₗ[𝕜] E) : IsSymmetric (LinearMap.adjoint T * T) := by intro x y simp [adjoint_inner_left, adjoint_inner_right] /-- The Gram operator T†T is a positive operator. -/ theorem re_inner_adjoint_mul_self_nonneg (T : E →ₗ[𝕜] E) (x : E) : 0 ≤ re ⟪x, (LinearMap.adjoint T * T) x⟫ := by simp only [Module.End.mul_apply, adjoint_inner_right, inner_self_eq_norm_sq_to_K] norm_cast exact sq_nonneg _ @[simp] theorem im_inner_adjoint_mul_self_eq_zero (T : E →ₗ[𝕜] E) (x : E) : im ⟪x, LinearMap.adjoint T (T x)⟫ = 0 := by simp only [Module.End.mul_apply, adjoint_inner_right, inner_self_eq_norm_sq_to_K] norm_cast end LinearMap section Unitary variable {H : Type} [NormedAddCommGroup H] [InnerProductSpace 𝕜 H] [CompleteSpace H] namespace ContinuousLinearMap variable {K : Type} [NormedAddCommGroup K] [InnerProductSpace 𝕜 K] [CompleteSpace K] theorem inner_map_map_iff_adjoint_comp_self (u : H →L[𝕜] K) : (∀ x y : H, ⟪u x, u y⟫_𝕜 = ⟪x, y⟫_𝕜) ↔ adjoint u ∘L u = 1 := by refine ⟨fun h ↦ ext fun x ↦ ?_, fun h ↦ ?_⟩ · refine ext_inner_right 𝕜 fun y ↦ ?_ simpa [star_eq_adjoint, adjoint_inner_left] using h x y · simp [← adjoint_inner_left, ← comp_apply, h] theorem norm_map_iff_adjoint_comp_self (u : H →L[𝕜] K) : (∀ x : H, ‖u x‖ = ‖x‖) ↔ adjoint u ∘L u = 1 := by rw [LinearMap.norm_map_iff_inner_map_map u, u.inner_map_map_iff_adjoint_comp_self] @[simp] lemma _root_.LinearIsometryEquiv.adjoint_eq_symm (e : H ≃ₗᵢ[𝕜] K) : adjoint (e : H →L[𝕜] K) = e.symm := let e' := (e : H →L[𝕜] K) calc adjoint e' = adjoint e' ∘L (e' ∘L e.symm) := by convert (adjoint e').comp_id.symm ext simp [e']	_ = e.symm := by rw [← comp_assoc, norm_map_iff_adjoint_comp_self e' \|>.mp e.norm_map] exact (e.symm : K →L[𝕜] H).id_comp	Mathlib/Analysis/InnerProductSpace/Adjoint.lean	484	486
/- Copyright (c) 2018 Kenny Lau. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kenny Lau, Mario Carneiro, Johan Commelin, Amelia Livingston, Anne Baanen -/ import Mathlib.RingTheory.Localization.Basic import Mathlib.RingTheory.Localization.Ideal import Mathlib.RingTheory.LocalRing.MaximalIdeal.Basic import Mathlib.Algebra.Group.Units.Hom import Mathlib.RingTheory.Ideal.MinimalPrime.Basic import Mathlib.RingTheory.Ideal.Over import Mathlib.RingTheory.Spectrum.Prime.Defs /-! # Localizations of commutative rings at the complement of a prime ideal ## Main definitions * `IsLocalization.AtPrime (P : Ideal R) [IsPrime P] (S : Type)` expresses that `S` is a localization at (the complement of) a prime ideal `P`, as an abbreviation of `IsLocalization P.prime_compl S` ## Main results `IsLocalization.AtPrime.isLocalRing`: a theorem (not an instance) stating a localization at the complement of a prime ideal is a local ring ## Implementation notes See `RingTheory.Localization.Basic` for a design overview. ## Tags localization, ring localization, commutative ring localization, characteristic predicate, commutative ring, field of fractions -/ variable {R : Type} [CommSemiring R] (S : Type) [CommSemiring S] variable [Algebra R S] {P : Type} [CommSemiring P] section AtPrime variable (P : Ideal R) [hp : P.IsPrime] /-- Given a prime ideal `P`, the typeclass `IsLocalization.AtPrime S P` states that `S` is isomorphic to the localization of `R` at the complement of `P`. -/ protected abbrev IsLocalization.AtPrime := IsLocalization P.primeCompl S /-- Given a prime ideal `P`, `Localization.AtPrime P` is a localization of `R` at the complement of `P`, as a quotient type. -/ protected abbrev Localization.AtPrime := Localization P.primeCompl namespace IsLocalization theorem AtPrime.Nontrivial [IsLocalization.AtPrime S P] : Nontrivial S := nontrivial_of_ne (0 : S) 1 fun hze => by rw [← (algebraMap R S).map_one, ← (algebraMap R S).map_zero] at hze obtain ⟨t, ht⟩ := (eq_iff_exists P.primeCompl S).1 hze have htz : (t : R) = 0 := by simpa using ht.symm exact t.2 (htz.symm ▸ P.zero_mem : ↑t ∈ P) theorem AtPrime.isLocalRing [IsLocalization.AtPrime S P] : IsLocalRing S := -- Porting note: since I couldn't get local instance running, I just specify it manually letI := AtPrime.Nontrivial S P IsLocalRing.of_nonunits_add (by intro x y hx hy hu obtain ⟨z, hxyz⟩ := isUnit_iff_exists_inv.1 hu have : ∀ {r : R} {s : P.primeCompl}, mk' S r s ∈ nonunits S → r ∈ P := fun {r s} => not_imp_comm.1 fun nr => isUnit_iff_exists_inv.2 ⟨mk' S ↑s (⟨r, nr⟩ : P.primeCompl), mk'_mul_mk'_eq_one' _ _ <\| show r ∈ P.primeCompl from nr⟩ rcases mk'_surjective P.primeCompl x with ⟨rx, sx, hrx⟩ rcases mk'_surjective P.primeCompl y with ⟨ry, sy, hry⟩ rcases mk'_surjective P.primeCompl z with ⟨rz, sz, hrz⟩ rw [← hrx, ← hry, ← hrz, ← mk'_add, ← mk'_mul, ← mk'_self S P.primeCompl.one_mem] at hxyz rw [← hrx] at hx rw [← hry] at hy obtain ⟨t, ht⟩ := IsLocalization.eq.1 hxyz simp only [mul_one, one_mul, Submonoid.coe_mul, Subtype.coe_mk] at ht suffices (t : R) (sx * sy * sz) ∈ P from not_or_intro (mt hp.mem_or_mem <\| not_or_intro sx.2 sy.2) sz.2 (hp.mem_or_mem <\| (hp.mem_or_mem this).resolve_left t.2) rw [← ht] exact P.mul_mem_left _ <\| P.mul_mem_right _ <\| P.add_mem (P.mul_mem_right _ <\| this hx) <\| P.mul_mem_right _ <\| this hy) @[deprecated (since := "2024-11-09")] alias AtPrime.localRing := AtPrime.isLocalRing end IsLocalization namespace Localization /-- The localization of `R` at the complement of a prime ideal is a local ring. -/ instance AtPrime.isLocalRing : IsLocalRing (Localization P.primeCompl) := IsLocalization.AtPrime.isLocalRing (Localization P.primeCompl) P end Localization end AtPrime namespace IsLocalization variable {A : Type*} [CommRing A] [IsDomain A] /-- The localization of an integral domain at the complement of a prime ideal is an integral domain. -/ instance isDomain_of_local_atPrime {P : Ideal A} (_ : P.IsPrime) : IsDomain (Localization.AtPrime P) := isDomain_localization P.primeCompl_le_nonZeroDivisors namespace AtPrime variable (I : Ideal R) [hI : I.IsPrime] [IsLocalization.AtPrime S I] /-- The prime ideals in the localization of a commutative ring at a prime ideal I are in order-preserving bijection with the prime ideals contained in I. -/ def orderIsoOfPrime : { p : Ideal S // p.IsPrime } ≃o { p : Ideal R // p.IsPrime ∧ p ≤ I } := (IsLocalization.orderIsoOfPrime I.primeCompl S).trans <\| .setCongr _ _ <\| show setOf _ = setOf _ by ext; simp [Ideal.primeCompl, ← le_compl_iff_disjoint_left] theorem isUnit_to_map_iff (x : R) : IsUnit ((algebraMap R S) x) ↔ x ∈ I.primeCompl := ⟨fun h hx => (isPrime_of_isPrime_disjoint I.primeCompl S I hI disjoint_compl_left).ne_top <\| (Ideal.map (algebraMap R S) I).eq_top_of_isUnit_mem (Ideal.mem_map_of_mem _ hx) h, fun h => map_units S ⟨x, h⟩⟩ -- Can't use typeclasses to infer the `IsLocalRing` instance, so use an `optParam` instead -- (since `IsLocalRing` is a `Prop`, there should be no unification issues.) theorem to_map_mem_maximal_iff (x : R) (h : IsLocalRing S := isLocalRing S I) : algebraMap R S x ∈ IsLocalRing.maximalIdeal S ↔ x ∈ I := not_iff_not.mp <\| by simpa only [IsLocalRing.mem_maximalIdeal, mem_nonunits_iff, Classical.not_not] using isUnit_to_map_iff S I x theorem comap_maximalIdeal (h : IsLocalRing S := isLocalRing S I) : (IsLocalRing.maximalIdeal S).comap (algebraMap R S) = I := Ideal.ext fun x => by simpa only [Ideal.mem_comap] using to_map_mem_maximal_iff _ I x theorem isUnit_mk'_iff (x : R) (y : I.primeCompl) : IsUnit (mk' S x y) ↔ x ∈ I.primeCompl := ⟨fun h hx => mk'_mem_iff.mpr ((to_map_mem_maximal_iff S I x).mpr hx) h, fun h => isUnit_iff_exists_inv.mpr ⟨mk' S ↑y ⟨x, h⟩, mk'_mul_mk'_eq_one ⟨x, h⟩ y⟩⟩ theorem mk'_mem_maximal_iff (x : R) (y : I.primeCompl) (h : IsLocalRing S := isLocalRing S I) : mk' S x y ∈ IsLocalRing.maximalIdeal S ↔ x ∈ I := not_iff_not.mp <\| by simpa only [IsLocalRing.mem_maximalIdeal, mem_nonunits_iff, Classical.not_not] using isUnit_mk'_iff S I x y end AtPrime end IsLocalization	namespace Localization open IsLocalization	Mathlib/RingTheory/Localization/AtPrime.lean	156	158
/- Copyright (c) 2021 Damiano Testa. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Damiano Testa -/ import Mathlib.Algebra.BigOperators.Group.Finset.Defs import Mathlib.Algebra.Regular.Basic /-! # Product of regular elements ## TODO Move to `Mathlib.Algebra.BigOperators.Group.Finset.Basic`? -/ variable {R : Type} {a b : R} section CommMonoid variable {ι R : Type} [CommMonoid R] {s : Finset ι} {f : ι → R} lemma IsLeftRegular.prod (h : ∀ i ∈ s, IsLeftRegular (f i)) : IsLeftRegular (∏ i ∈ s, f i) := s.prod_induction _ _ (@IsLeftRegular.mul R _) isRegular_one.left h lemma IsRightRegular.prod (h : ∀ i ∈ s, IsRightRegular (f i)) : IsRightRegular (∏ i ∈ s, f i) := s.prod_induction _ _ (@IsRightRegular.mul R _) isRegular_one.right h	lemma IsRegular.prod (h : ∀ i ∈ s, IsRegular (f i)) :	Mathlib/Algebra/Regular/Pow.lean	31	32
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Floris van Doorn, Violeta Hernández Palacios -/ import Mathlib.Algebra.GroupWithZero.Divisibility import Mathlib.Data.Nat.SuccPred import Mathlib.Order.SuccPred.InitialSeg import Mathlib.SetTheory.Ordinal.Basic /-! # Ordinal arithmetic Ordinals have an addition (corresponding to disjoint union) that turns them into an additive monoid, and a multiplication (corresponding to the lexicographic order on the product) that turns them into a monoid. One can also define correspondingly a subtraction, a division, a successor function, a power function and a logarithm function. We also define limit ordinals and prove the basic induction principle on ordinals separating successor ordinals and limit ordinals, in `limitRecOn`. ## Main definitions and results * `o₁ + o₂` is the order on the disjoint union of `o₁` and `o₂` obtained by declaring that every element of `o₁` is smaller than every element of `o₂`. * `o₁ - o₂` is the unique ordinal `o` such that `o₂ + o = o₁`, when `o₂ ≤ o₁`. * `o₁ * o₂` is the lexicographic order on `o₂ × o₁`. * `o₁ / o₂` is the ordinal `o` such that `o₁ = o₂ * o + o'` with `o' < o₂`. We also define the divisibility predicate, and a modulo operation. * `Order.succ o = o + 1` is the successor of `o`. * `pred o` if the predecessor of `o`. If `o` is not a successor, we set `pred o = o`. We discuss the properties of casts of natural numbers of and of `ω` with respect to these operations. Some properties of the operations are also used to discuss general tools on ordinals: * `IsLimit o`: an ordinal is a limit ordinal if it is neither `0` nor a successor. * `limitRecOn` is the main induction principle of ordinals: if one can prove a property by induction at successor ordinals and at limit ordinals, then it holds for all ordinals. * `IsNormal`: a function `f : Ordinal → Ordinal` satisfies `IsNormal` if it is strictly increasing and order-continuous, i.e., the image `f o` of a limit ordinal `o` is the sup of `f a` for `a < o`. Various other basic arithmetic results are given in `Principal.lean` instead. -/ assert_not_exists Field Module noncomputable section open Function Cardinal Set Equiv Order open scoped Ordinal universe u v w namespace Ordinal variable {α β γ : Type} {r : α → α → Prop} {s : β → β → Prop} {t : γ → γ → Prop} /-! ### Further properties of addition on ordinals -/ @[simp] theorem lift_add (a b : Ordinal.{v}) : lift.{u} (a + b) = lift.{u} a + lift.{u} b := Quotient.inductionOn₂ a b fun ⟨_α, _r, _⟩ ⟨_β, _s, _⟩ => Quotient.sound ⟨(RelIso.preimage Equiv.ulift _).trans (RelIso.sumLexCongr (RelIso.preimage Equiv.ulift _) (RelIso.preimage Equiv.ulift _)).symm⟩ @[simp] theorem lift_succ (a : Ordinal.{v}) : lift.{u} (succ a) = succ (lift.{u} a) := by rw [← add_one_eq_succ, lift_add, lift_one] rfl instance instAddLeftReflectLE : AddLeftReflectLE Ordinal.{u} where elim c a b := by refine inductionOn₃ a b c fun α r _ β s _ γ t _ ⟨f⟩ ↦ ?_ have H₁ a : f (Sum.inl a) = Sum.inl a := by simpa using ((InitialSeg.leAdd t r).trans f).eq (InitialSeg.leAdd t s) a have H₂ a : ∃ b, f (Sum.inr a) = Sum.inr b := by generalize hx : f (Sum.inr a) = x obtain x \| x := x · rw [← H₁, f.inj] at hx contradiction · exact ⟨x, rfl⟩ choose g hg using H₂ refine (RelEmbedding.ofMonotone g fun _ _ h ↦ ?_).ordinal_type_le rwa [← @Sum.lex_inr_inr _ t _ s, ← hg, ← hg, f.map_rel_iff, Sum.lex_inr_inr] instance : IsLeftCancelAdd Ordinal where add_left_cancel a b c h := by simpa only [le_antisymm_iff, add_le_add_iff_left] using h @[deprecated add_left_cancel_iff (since := "2024-12-11")] protected theorem add_left_cancel (a) {b c : Ordinal} : a + b = a + c ↔ b = c := add_left_cancel_iff private theorem add_lt_add_iff_left' (a) {b c : Ordinal} : a + b < a + c ↔ b < c := by rw [← not_le, ← not_le, add_le_add_iff_left] instance instAddLeftStrictMono : AddLeftStrictMono Ordinal.{u} := ⟨fun a _b _c ↦ (add_lt_add_iff_left' a).2⟩ instance instAddLeftReflectLT : AddLeftReflectLT Ordinal.{u} := ⟨fun a _b _c ↦ (add_lt_add_iff_left' a).1⟩ instance instAddRightReflectLT : AddRightReflectLT Ordinal.{u} := ⟨fun _a _b _c ↦ lt_imp_lt_of_le_imp_le fun h => add_le_add_right h _⟩ theorem add_le_add_iff_right {a b : Ordinal} : ∀ n : ℕ, a + n ≤ b + n ↔ a ≤ b \| 0 => by simp \| n + 1 => by simp only [natCast_succ, add_succ, add_succ, succ_le_succ_iff, add_le_add_iff_right] theorem add_right_cancel {a b : Ordinal} (n : ℕ) : a + n = b + n ↔ a = b := by simp only [le_antisymm_iff, add_le_add_iff_right] theorem add_eq_zero_iff {a b : Ordinal} : a + b = 0 ↔ a = 0 ∧ b = 0 := inductionOn₂ a b fun α r _ β s _ => by simp_rw [← type_sum_lex, type_eq_zero_iff_isEmpty] exact isEmpty_sum theorem left_eq_zero_of_add_eq_zero {a b : Ordinal} (h : a + b = 0) : a = 0 := (add_eq_zero_iff.1 h).1 theorem right_eq_zero_of_add_eq_zero {a b : Ordinal} (h : a + b = 0) : b = 0 := (add_eq_zero_iff.1 h).2 /-! ### The predecessor of an ordinal -/ open Classical in /-- The ordinal predecessor of `o` is `o'` if `o = succ o'`, and `o` otherwise. -/ def pred (o : Ordinal) : Ordinal := if h : ∃ a, o = succ a then Classical.choose h else o @[simp] theorem pred_succ (o) : pred (succ o) = o := by have h : ∃ a, succ o = succ a := ⟨_, rfl⟩ simpa only [pred, dif_pos h] using (succ_injective <\| Classical.choose_spec h).symm theorem pred_le_self (o) : pred o ≤ o := by classical exact if h : ∃ a, o = succ a then by let ⟨a, e⟩ := h rw [e, pred_succ]; exact le_succ a else by rw [pred, dif_neg h] theorem pred_eq_iff_not_succ {o} : pred o = o ↔ ¬∃ a, o = succ a := ⟨fun e ⟨a, e'⟩ => by rw [e', pred_succ] at e; exact (lt_succ a).ne e, fun h => dif_neg h⟩ theorem pred_eq_iff_not_succ' {o} : pred o = o ↔ ∀ a, o ≠ succ a := by simpa using pred_eq_iff_not_succ theorem pred_lt_iff_is_succ {o} : pred o < o ↔ ∃ a, o = succ a := Iff.trans (by simp only [le_antisymm_iff, pred_le_self, true_and, not_le]) (iff_not_comm.1 pred_eq_iff_not_succ).symm @[simp] theorem pred_zero : pred 0 = 0 := pred_eq_iff_not_succ'.2 fun a => (succ_ne_zero a).symm theorem succ_pred_iff_is_succ {o} : succ (pred o) = o ↔ ∃ a, o = succ a := ⟨fun e => ⟨_, e.symm⟩, fun ⟨a, e⟩ => by simp only [e, pred_succ]⟩ theorem succ_lt_of_not_succ {o b : Ordinal} (h : ¬∃ a, o = succ a) : succ b < o ↔ b < o := ⟨(lt_succ b).trans, fun l => lt_of_le_of_ne (succ_le_of_lt l) fun e => h ⟨_, e.symm⟩⟩ theorem lt_pred {a b} : a < pred b ↔ succ a < b := by classical exact if h : ∃ a, b = succ a then by let ⟨c, e⟩ := h rw [e, pred_succ, succ_lt_succ_iff] else by simp only [pred, dif_neg h, succ_lt_of_not_succ h] theorem pred_le {a b} : pred a ≤ b ↔ a ≤ succ b := le_iff_le_iff_lt_iff_lt.2 lt_pred @[simp] theorem lift_is_succ {o : Ordinal.{v}} : (∃ a, lift.{u} o = succ a) ↔ ∃ a, o = succ a := ⟨fun ⟨a, h⟩ => let ⟨b, e⟩ := mem_range_lift_of_le <\| show a ≤ lift.{u} o from le_of_lt <\| h.symm ▸ lt_succ a ⟨b, (lift_inj.{u,v}).1 <\| by rw [h, ← e, lift_succ]⟩, fun ⟨a, h⟩ => ⟨lift.{u} a, by simp only [h, lift_succ]⟩⟩ @[simp] theorem lift_pred (o : Ordinal.{v}) : lift.{u} (pred o) = pred (lift.{u} o) := by classical exact if h : ∃ a, o = succ a then by obtain ⟨a, e⟩ := h; simp only [e, pred_succ, lift_succ] else by rw [pred_eq_iff_not_succ.2 h, pred_eq_iff_not_succ.2 (mt lift_is_succ.1 h)] /-! ### Limit ordinals -/ /-- A limit ordinal is an ordinal which is not zero and not a successor. TODO: deprecate this in favor of `Order.IsSuccLimit`. -/ def IsLimit (o : Ordinal) : Prop := IsSuccLimit o theorem isLimit_iff {o} : IsLimit o ↔ o ≠ 0 ∧ IsSuccPrelimit o := by simp [IsLimit, IsSuccLimit] theorem IsLimit.isSuccPrelimit {o} (h : IsLimit o) : IsSuccPrelimit o := IsSuccLimit.isSuccPrelimit h theorem IsLimit.succ_lt {o a : Ordinal} (h : IsLimit o) : a < o → succ a < o := IsSuccLimit.succ_lt h theorem isSuccPrelimit_zero : IsSuccPrelimit (0 : Ordinal) := isSuccPrelimit_bot theorem not_zero_isLimit : ¬IsLimit 0 := not_isSuccLimit_bot theorem not_succ_isLimit (o) : ¬IsLimit (succ o) := not_isSuccLimit_succ o theorem not_succ_of_isLimit {o} (h : IsLimit o) : ¬∃ a, o = succ a \| ⟨a, e⟩ => not_succ_isLimit a (e ▸ h) theorem succ_lt_of_isLimit {o a : Ordinal} (h : IsLimit o) : succ a < o ↔ a < o := IsSuccLimit.succ_lt_iff h theorem le_succ_of_isLimit {o} (h : IsLimit o) {a} : o ≤ succ a ↔ o ≤ a := le_iff_le_iff_lt_iff_lt.2 <\| succ_lt_of_isLimit h theorem limit_le {o} (h : IsLimit o) {a} : o ≤ a ↔ ∀ x < o, x ≤ a := ⟨fun h _x l => l.le.trans h, fun H => (le_succ_of_isLimit h).1 <\| le_of_not_lt fun hn => not_lt_of_le (H _ hn) (lt_succ a)⟩ theorem lt_limit {o} (h : IsLimit o) {a} : a < o ↔ ∃ x < o, a < x := by -- Porting note: `bex_def` is required. simpa only [not_forall₂, not_le, bex_def] using not_congr (@limit_le _ h a) @[simp] theorem lift_isLimit (o : Ordinal.{v}) : IsLimit (lift.{u,v} o) ↔ IsLimit o := liftInitialSeg.isSuccLimit_apply_iff theorem IsLimit.pos {o : Ordinal} (h : IsLimit o) : 0 < o := IsSuccLimit.bot_lt h theorem IsLimit.ne_zero {o : Ordinal} (h : IsLimit o) : o ≠ 0 := h.pos.ne' theorem IsLimit.one_lt {o : Ordinal} (h : IsLimit o) : 1 < o := by simpa only [succ_zero] using h.succ_lt h.pos theorem IsLimit.nat_lt {o : Ordinal} (h : IsLimit o) : ∀ n : ℕ, (n : Ordinal) < o \| 0 => h.pos \| n + 1 => h.succ_lt (IsLimit.nat_lt h n) theorem zero_or_succ_or_limit (o : Ordinal) : o = 0 ∨ (∃ a, o = succ a) ∨ IsLimit o := by simpa [eq_comm] using isMin_or_mem_range_succ_or_isSuccLimit o theorem isLimit_of_not_succ_of_ne_zero {o : Ordinal} (h : ¬∃ a, o = succ a) (h' : o ≠ 0) : IsLimit o := ((zero_or_succ_or_limit o).resolve_left h').resolve_left h -- TODO: this is an iff with `IsSuccPrelimit` theorem IsLimit.sSup_Iio {o : Ordinal} (h : IsLimit o) : sSup (Iio o) = o := by apply (csSup_le' (fun a ha ↦ le_of_lt ha)).antisymm apply le_of_forall_lt intro a ha exact (lt_succ a).trans_le (le_csSup bddAbove_Iio (h.succ_lt ha)) theorem IsLimit.iSup_Iio {o : Ordinal} (h : IsLimit o) : ⨆ a : Iio o, a.1 = o := by rw [← sSup_eq_iSup', h.sSup_Iio] /-- Main induction principle of ordinals: if one can prove a property by induction at successor ordinals and at limit ordinals, then it holds for all ordinals. -/ @[elab_as_elim] def limitRecOn {motive : Ordinal → Sort} (o : Ordinal) (zero : motive 0) (succ : ∀ o, motive o → motive (succ o)) (isLimit : ∀ o, IsLimit o → (∀ o' < o, motive o') → motive o) : motive o := by refine SuccOrder.limitRecOn o (fun a ha ↦ ?_) (fun a _ ↦ succ a) isLimit convert zero simpa using ha @[simp] theorem limitRecOn_zero {motive} (H₁ H₂ H₃) : @limitRecOn motive 0 H₁ H₂ H₃ = H₁ := SuccOrder.limitRecOn_isMin _ _ _ isMin_bot @[simp] theorem limitRecOn_succ {motive} (o H₁ H₂ H₃) : @limitRecOn motive (succ o) H₁ H₂ H₃ = H₂ o (@limitRecOn motive o H₁ H₂ H₃) := SuccOrder.limitRecOn_succ .. @[simp] theorem limitRecOn_limit {motive} (o H₁ H₂ H₃ h) : @limitRecOn motive o H₁ H₂ H₃ = H₃ o h fun x _h => @limitRecOn motive x H₁ H₂ H₃ := SuccOrder.limitRecOn_of_isSuccLimit .. /-- Bounded recursion on ordinals. Similar to `limitRecOn`, with the assumption `o < l` added to all cases. The final term's domain is the ordinals below `l`. -/ @[elab_as_elim] def boundedLimitRecOn {l : Ordinal} (lLim : l.IsLimit) {motive : Iio l → Sort} (o : Iio l) (zero : motive ⟨0, lLim.pos⟩) (succ : (o : Iio l) → motive o → motive ⟨succ o, lLim.succ_lt o.2⟩) (isLimit : (o : Iio l) → IsLimit o → (Π o' < o, motive o') → motive o) : motive o := limitRecOn (motive := fun p ↦ (h : p < l) → motive ⟨p, h⟩) o.1 (fun _ ↦ zero) (fun o ih h ↦ succ ⟨o, _⟩ <\| ih <\| (lt_succ o).trans h) (fun _o ho ih _ ↦ isLimit _ ho fun _o' h ↦ ih _ h _) o.2 @[simp] theorem boundedLimitRec_zero {l} (lLim : l.IsLimit) {motive} (H₁ H₂ H₃) : @boundedLimitRecOn l lLim motive ⟨0, lLim.pos⟩ H₁ H₂ H₃ = H₁ := by rw [boundedLimitRecOn, limitRecOn_zero] @[simp] theorem boundedLimitRec_succ {l} (lLim : l.IsLimit) {motive} (o H₁ H₂ H₃) : @boundedLimitRecOn l lLim motive ⟨succ o.1, lLim.succ_lt o.2⟩ H₁ H₂ H₃ = H₂ o (@boundedLimitRecOn l lLim motive o H₁ H₂ H₃) := by rw [boundedLimitRecOn, limitRecOn_succ] rfl theorem boundedLimitRec_limit {l} (lLim : l.IsLimit) {motive} (o H₁ H₂ H₃ oLim) : @boundedLimitRecOn l lLim motive o H₁ H₂ H₃ = H₃ o oLim (fun x _ ↦ @boundedLimitRecOn l lLim motive x H₁ H₂ H₃) := by rw [boundedLimitRecOn, limitRecOn_limit] rfl instance orderTopToTypeSucc (o : Ordinal) : OrderTop (succ o).toType := @OrderTop.mk _ _ (Top.mk _) le_enum_succ theorem enum_succ_eq_top {o : Ordinal} : enum (α := (succ o).toType) (· < ·) ⟨o, type_toType _ ▸ lt_succ o⟩ = ⊤ := rfl theorem has_succ_of_type_succ_lt {α} {r : α → α → Prop} [wo : IsWellOrder α r] (h : ∀ a < type r, succ a < type r) (x : α) : ∃ y, r x y := by use enum r ⟨succ (typein r x), h _ (typein_lt_type r x)⟩ convert enum_lt_enum.mpr _ · rw [enum_typein] · rw [Subtype.mk_lt_mk, lt_succ_iff] theorem toType_noMax_of_succ_lt {o : Ordinal} (ho : ∀ a < o, succ a < o) : NoMaxOrder o.toType := ⟨has_succ_of_type_succ_lt (type_toType _ ▸ ho)⟩ theorem bounded_singleton {r : α → α → Prop} [IsWellOrder α r] (hr : (type r).IsLimit) (x) : Bounded r {x} := by refine ⟨enum r ⟨succ (typein r x), hr.succ_lt (typein_lt_type r x)⟩, ?_⟩ intro b hb rw [mem_singleton_iff.1 hb] nth_rw 1 [← enum_typein r x] rw [@enum_lt_enum _ r, Subtype.mk_lt_mk] apply lt_succ @[simp] theorem typein_ordinal (o : Ordinal.{u}) : @typein Ordinal (· < ·) _ o = Ordinal.lift.{u + 1} o := by refine Quotient.inductionOn o ?_ rintro ⟨α, r, wo⟩; apply Quotient.sound constructor; refine ((RelIso.preimage Equiv.ulift r).trans (enum r).symm).symm theorem mk_Iio_ordinal (o : Ordinal.{u}) : #(Iio o) = Cardinal.lift.{u + 1} o.card := by rw [lift_card, ← typein_ordinal] rfl /-! ### Normal ordinal functions -/ /-- A normal ordinal function is a strictly increasing function which is order-continuous, i.e., the image `f o` of a limit ordinal `o` is the sup of `f a` for `a < o`. -/ def IsNormal (f : Ordinal → Ordinal) : Prop := (∀ o, f o < f (succ o)) ∧ ∀ o, IsLimit o → ∀ a, f o ≤ a ↔ ∀ b < o, f b ≤ a theorem IsNormal.limit_le {f} (H : IsNormal f) : ∀ {o}, IsLimit o → ∀ {a}, f o ≤ a ↔ ∀ b < o, f b ≤ a := @H.2 theorem IsNormal.limit_lt {f} (H : IsNormal f) {o} (h : IsLimit o) {a} : a < f o ↔ ∃ b < o, a < f b := not_iff_not.1 <\| by simpa only [exists_prop, not_exists, not_and, not_lt] using H.2 _ h a theorem IsNormal.strictMono {f} (H : IsNormal f) : StrictMono f := fun a b => limitRecOn b (Not.elim (not_lt_of_le <\| Ordinal.zero_le _)) (fun _b IH h => (lt_or_eq_of_le (le_of_lt_succ h)).elim (fun h => (IH h).trans (H.1 _)) fun e => e ▸ H.1 _) fun _b l _IH h => lt_of_lt_of_le (H.1 a) ((H.2 _ l _).1 le_rfl _ (l.succ_lt h)) theorem IsNormal.monotone {f} (H : IsNormal f) : Monotone f := H.strictMono.monotone theorem isNormal_iff_strictMono_limit (f : Ordinal → Ordinal) : IsNormal f ↔ StrictMono f ∧ ∀ o, IsLimit o → ∀ a, (∀ b < o, f b ≤ a) → f o ≤ a := ⟨fun hf => ⟨hf.strictMono, fun a ha c => (hf.2 a ha c).2⟩, fun ⟨hs, hl⟩ => ⟨fun a => hs (lt_succ a), fun a ha c => ⟨fun hac _b hba => ((hs hba).trans_le hac).le, hl a ha c⟩⟩⟩ theorem IsNormal.lt_iff {f} (H : IsNormal f) {a b} : f a < f b ↔ a < b := StrictMono.lt_iff_lt <\| H.strictMono theorem IsNormal.le_iff {f} (H : IsNormal f) {a b} : f a ≤ f b ↔ a ≤ b := le_iff_le_iff_lt_iff_lt.2 H.lt_iff theorem IsNormal.inj {f} (H : IsNormal f) {a b} : f a = f b ↔ a = b := by simp only [le_antisymm_iff, H.le_iff] theorem IsNormal.id_le {f} (H : IsNormal f) : id ≤ f := H.strictMono.id_le theorem IsNormal.le_apply {f} (H : IsNormal f) {a} : a ≤ f a := H.strictMono.le_apply theorem IsNormal.le_iff_eq {f} (H : IsNormal f) {a} : f a ≤ a ↔ f a = a := H.le_apply.le_iff_eq theorem IsNormal.le_set {f o} (H : IsNormal f) (p : Set Ordinal) (p0 : p.Nonempty) (b) (H₂ : ∀ o, b ≤ o ↔ ∀ a ∈ p, a ≤ o) : f b ≤ o ↔ ∀ a ∈ p, f a ≤ o := ⟨fun h _ pa => (H.le_iff.2 ((H₂ _).1 le_rfl _ pa)).trans h, fun h => by induction b using limitRecOn with \| zero => obtain ⟨x, px⟩ := p0 have := Ordinal.le_zero.1 ((H₂ _).1 (Ordinal.zero_le _) _ px) rw [this] at px exact h _ px \| succ S _ => rcases not_forall₂.1 (mt (H₂ S).2 <\| (lt_succ S).not_le) with ⟨a, h₁, h₂⟩ exact (H.le_iff.2 <\| succ_le_of_lt <\| not_le.1 h₂).trans (h _ h₁) \| isLimit S L _ => refine (H.2 _ L _).2 fun a h' => ?_ rcases not_forall₂.1 (mt (H₂ a).2 h'.not_le) with ⟨b, h₁, h₂⟩ exact (H.le_iff.2 <\| (not_le.1 h₂).le).trans (h _ h₁)⟩ theorem IsNormal.le_set' {f o} (H : IsNormal f) (p : Set α) (p0 : p.Nonempty) (g : α → Ordinal) (b) (H₂ : ∀ o, b ≤ o ↔ ∀ a ∈ p, g a ≤ o) : f b ≤ o ↔ ∀ a ∈ p, f (g a) ≤ o := by simpa [H₂] using H.le_set (g '' p) (p0.image g) b theorem IsNormal.refl : IsNormal id := ⟨lt_succ, fun _o l _a => Ordinal.limit_le l⟩ theorem IsNormal.trans {f g} (H₁ : IsNormal f) (H₂ : IsNormal g) : IsNormal (f ∘ g) := ⟨fun _x => H₁.lt_iff.2 (H₂.1 _), fun o l _a => H₁.le_set' (· < o) ⟨0, l.pos⟩ g _ fun _c => H₂.2 _ l _⟩ theorem IsNormal.isLimit {f} (H : IsNormal f) {o} (ho : IsLimit o) : IsLimit (f o) := by rw [isLimit_iff, isSuccPrelimit_iff_succ_lt] use (H.lt_iff.2 ho.pos).ne_bot intro a ha obtain ⟨b, hb, hab⟩ := (H.limit_lt ho).1 ha rw [← succ_le_iff] at hab apply hab.trans_lt rwa [H.lt_iff] theorem add_le_of_limit {a b c : Ordinal} (h : IsLimit b) : a + b ≤ c ↔ ∀ b' < b, a + b' ≤ c := ⟨fun h _ l => (add_le_add_left l.le _).trans h, fun H => le_of_not_lt <\| by -- Porting note: `induction` tactics are required because of the parser bug. induction a using inductionOn with \| H α r => induction b using inductionOn with \| H β s => intro l suffices ∀ x : β, Sum.Lex r s (Sum.inr x) (enum _ ⟨_, l⟩) by -- Porting note: `revert` & `intro` is required because `cases'` doesn't replace -- `enum _ _ l` in `this`. revert this; rcases enum _ ⟨_, l⟩ with x \| x <;> intro this · cases this (enum s ⟨0, h.pos⟩) · exact irrefl _ (this _) intro x rw [← typein_lt_typein (Sum.Lex r s), typein_enum] have := H _ (h.succ_lt (typein_lt_type s x)) rw [add_succ, succ_le_iff] at this refine (RelEmbedding.ofMonotone (fun a => ?_) fun a b => ?_).ordinal_type_le.trans_lt this · rcases a with ⟨a \| b, h⟩ · exact Sum.inl a · exact Sum.inr ⟨b, by cases h; assumption⟩ · rcases a with ⟨a \| a, h₁⟩ <;> rcases b with ⟨b \| b, h₂⟩ <;> cases h₁ <;> cases h₂ <;> rintro ⟨⟩ <;> constructor <;> assumption⟩ theorem isNormal_add_right (a : Ordinal) : IsNormal (a + ·) := ⟨fun b => (add_lt_add_iff_left a).2 (lt_succ b), fun _b l _c => add_le_of_limit l⟩ theorem isLimit_add (a) {b} : IsLimit b → IsLimit (a + b) := (isNormal_add_right a).isLimit alias IsLimit.add := isLimit_add /-! ### Subtraction on ordinals -/ /-- The set in the definition of subtraction is nonempty. -/ private theorem sub_nonempty {a b : Ordinal} : { o \| a ≤ b + o }.Nonempty := ⟨a, le_add_left _ _⟩ /-- `a - b` is the unique ordinal satisfying `b + (a - b) = a` when `b ≤ a`. -/ instance sub : Sub Ordinal := ⟨fun a b => sInf { o \| a ≤ b + o }⟩ theorem le_add_sub (a b : Ordinal) : a ≤ b + (a - b) := csInf_mem sub_nonempty theorem sub_le {a b c : Ordinal} : a - b ≤ c ↔ a ≤ b + c := ⟨fun h => (le_add_sub a b).trans (add_le_add_left h _), fun h => csInf_le' h⟩ theorem lt_sub {a b c : Ordinal} : a < b - c ↔ c + a < b := lt_iff_lt_of_le_iff_le sub_le theorem add_sub_cancel (a b : Ordinal) : a + b - a = b := le_antisymm (sub_le.2 <\| le_rfl) ((add_le_add_iff_left a).1 <\| le_add_sub _ _) theorem sub_eq_of_add_eq {a b c : Ordinal} (h : a + b = c) : c - a = b := h ▸ add_sub_cancel _ _ theorem sub_le_self (a b : Ordinal) : a - b ≤ a := sub_le.2 <\| le_add_left _ _ protected theorem add_sub_cancel_of_le {a b : Ordinal} (h : b ≤ a) : b + (a - b) = a := (le_add_sub a b).antisymm' (by rcases zero_or_succ_or_limit (a - b) with (e \| ⟨c, e⟩ \| l) · simp only [e, add_zero, h] · rw [e, add_succ, succ_le_iff, ← lt_sub, e] exact lt_succ c · exact (add_le_of_limit l).2 fun c l => (lt_sub.1 l).le) theorem le_sub_of_le {a b c : Ordinal} (h : b ≤ a) : c ≤ a - b ↔ b + c ≤ a := by rw [← add_le_add_iff_left b, Ordinal.add_sub_cancel_of_le h] theorem sub_lt_of_le {a b c : Ordinal} (h : b ≤ a) : a - b < c ↔ a < b + c := lt_iff_lt_of_le_iff_le (le_sub_of_le h) instance existsAddOfLE : ExistsAddOfLE Ordinal := ⟨fun h => ⟨_, (Ordinal.add_sub_cancel_of_le h).symm⟩⟩ @[simp] theorem sub_zero (a : Ordinal) : a - 0 = a := by simpa only [zero_add] using add_sub_cancel 0 a @[simp] theorem zero_sub (a : Ordinal) : 0 - a = 0 := by rw [← Ordinal.le_zero]; apply sub_le_self @[simp] theorem sub_self (a : Ordinal) : a - a = 0 := by simpa only [add_zero] using add_sub_cancel a 0 protected theorem sub_eq_zero_iff_le {a b : Ordinal} : a - b = 0 ↔ a ≤ b := ⟨fun h => by simpa only [h, add_zero] using le_add_sub a b, fun h => by rwa [← Ordinal.le_zero, sub_le, add_zero]⟩ protected theorem sub_ne_zero_iff_lt {a b : Ordinal} : a - b ≠ 0 ↔ b < a := by simpa using Ordinal.sub_eq_zero_iff_le.not theorem sub_sub (a b c : Ordinal) : a - b - c = a - (b + c) := eq_of_forall_ge_iff fun d => by rw [sub_le, sub_le, sub_le, add_assoc] @[simp] theorem add_sub_add_cancel (a b c : Ordinal) : a + b - (a + c) = b - c := by rw [← sub_sub, add_sub_cancel] theorem le_sub_of_add_le {a b c : Ordinal} (h : b + c ≤ a) : c ≤ a - b := by rw [← add_le_add_iff_left b] exact h.trans (le_add_sub a b) theorem sub_lt_of_lt_add {a b c : Ordinal} (h : a < b + c) (hc : 0 < c) : a - b < c := by obtain hab \| hba := lt_or_le a b · rwa [Ordinal.sub_eq_zero_iff_le.2 hab.le] · rwa [sub_lt_of_le hba] theorem lt_add_iff {a b c : Ordinal} (hc : c ≠ 0) : a < b + c ↔ ∃ d < c, a ≤ b + d := by use fun h ↦ ⟨_, sub_lt_of_lt_add h hc.bot_lt, le_add_sub a b⟩ rintro ⟨d, hd, ha⟩ exact ha.trans_lt (add_lt_add_left hd b) theorem add_le_iff {a b c : Ordinal} (hb : b ≠ 0) : a + b ≤ c ↔ ∀ d < b, a + d < c := by simpa using (lt_add_iff hb).not @[deprecated add_le_iff (since := "2024-12-08")] theorem add_le_of_forall_add_lt {a b c : Ordinal} (hb : 0 < b) (h : ∀ d < b, a + d < c) : a + b ≤ c := (add_le_iff hb.ne').2 h theorem isLimit_sub {a b} (ha : IsLimit a) (h : b < a) : IsLimit (a - b) := by rw [isLimit_iff, Ordinal.sub_ne_zero_iff_lt, isSuccPrelimit_iff_succ_lt] refine ⟨h, fun c hc ↦ ?_⟩ rw [lt_sub] at hc ⊢ rw [add_succ] exact ha.succ_lt hc /-! ### Multiplication of ordinals -/ /-- The multiplication of ordinals `o₁` and `o₂` is the (well founded) lexicographic order on `o₂ × o₁`. -/ instance monoid : Monoid Ordinal.{u} where mul a b := Quotient.liftOn₂ a b (fun ⟨α, r, _⟩ ⟨β, s, _⟩ => ⟦⟨β × α, Prod.Lex s r, inferInstance⟩⟧ : WellOrder → WellOrder → Ordinal) fun ⟨_, _, _⟩ _ _ _ ⟨f⟩ ⟨g⟩ => Quot.sound ⟨RelIso.prodLexCongr g f⟩ one := 1 mul_assoc a b c := Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ => Eq.symm <\| Quotient.sound ⟨⟨prodAssoc _ _ _, @fun a b => by rcases a with ⟨⟨a₁, a₂⟩, a₃⟩ rcases b with ⟨⟨b₁, b₂⟩, b₃⟩ simp [Prod.lex_def, and_or_left, or_assoc, and_assoc]⟩⟩ mul_one a := inductionOn a fun α r _ => Quotient.sound ⟨⟨punitProd _, @fun a b => by rcases a with ⟨⟨⟨⟩⟩, a⟩; rcases b with ⟨⟨⟨⟩⟩, b⟩ simp only [Prod.lex_def, EmptyRelation, false_or] simp only [eq_self_iff_true, true_and] rfl⟩⟩ one_mul a := inductionOn a fun α r _ => Quotient.sound ⟨⟨prodPUnit _, @fun a b => by rcases a with ⟨a, ⟨⟨⟩⟩⟩; rcases b with ⟨b, ⟨⟨⟩⟩⟩ simp only [Prod.lex_def, EmptyRelation, and_false, or_false] rfl⟩⟩ @[simp] theorem type_prod_lex {α β : Type u} (r : α → α → Prop) (s : β → β → Prop) [IsWellOrder α r] [IsWellOrder β s] : type (Prod.Lex s r) = type r type s := rfl private theorem mul_eq_zero' {a b : Ordinal} : a * b = 0 ↔ a = 0 ∨ b = 0 := inductionOn a fun α _ _ => inductionOn b fun β _ _ => by simp_rw [← type_prod_lex, type_eq_zero_iff_isEmpty] rw [or_comm] exact isEmpty_prod instance monoidWithZero : MonoidWithZero Ordinal := { Ordinal.monoid with zero := 0 mul_zero := fun _a => mul_eq_zero'.2 <\| Or.inr rfl zero_mul := fun _a => mul_eq_zero'.2 <\| Or.inl rfl } instance noZeroDivisors : NoZeroDivisors Ordinal := ⟨fun {_ _} => mul_eq_zero'.1⟩ @[simp] theorem lift_mul (a b : Ordinal.{v}) : lift.{u} (a * b) = lift.{u} a * lift.{u} b := Quotient.inductionOn₂ a b fun ⟨_α, _r, _⟩ ⟨_β, _s, _⟩ => Quotient.sound ⟨(RelIso.preimage Equiv.ulift _).trans (RelIso.prodLexCongr (RelIso.preimage Equiv.ulift _) (RelIso.preimage Equiv.ulift _)).symm⟩ @[simp] theorem card_mul (a b) : card (a * b) = card a * card b := Quotient.inductionOn₂ a b fun ⟨α, _r, _⟩ ⟨β, _s, _⟩ => mul_comm #β #α instance leftDistribClass : LeftDistribClass Ordinal.{u} := ⟨fun a b c => Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ => Quotient.sound ⟨⟨sumProdDistrib _ _ _, by rintro ⟨a₁ \| a₁, a₂⟩ ⟨b₁ \| b₁, b₂⟩ <;> simp only [Prod.lex_def, Sum.lex_inl_inl, Sum.Lex.sep, Sum.lex_inr_inl, Sum.lex_inr_inr, sumProdDistrib_apply_left, sumProdDistrib_apply_right, reduceCtorEq] <;> -- Porting note: `Sum.inr.inj_iff` is required. simp only [Sum.inl.inj_iff, Sum.inr.inj_iff, true_or, false_and, false_or]⟩⟩⟩ theorem mul_succ (a b : Ordinal) : a * succ b = a * b + a := mul_add_one a b instance mulLeftMono : MulLeftMono Ordinal.{u} := ⟨fun c a b => Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ ⟨f⟩ => by refine (RelEmbedding.ofMonotone (fun a : α × γ => (f a.1, a.2)) fun a b h => ?_).ordinal_type_le obtain ⟨-, -, h'⟩ \| ⟨-, h'⟩ := h · exact Prod.Lex.left _ _ (f.toRelEmbedding.map_rel_iff.2 h') · exact Prod.Lex.right _ h'⟩ instance mulRightMono : MulRightMono Ordinal.{u} := ⟨fun c a b => Quotient.inductionOn₃ a b c fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ ⟨f⟩ => by refine (RelEmbedding.ofMonotone (fun a : γ × α => (a.1, f a.2)) fun a b h => ?_).ordinal_type_le obtain ⟨-, -, h'⟩ \| ⟨-, h'⟩ := h · exact Prod.Lex.left _ _ h' · exact Prod.Lex.right _ (f.toRelEmbedding.map_rel_iff.2 h')⟩ theorem le_mul_left (a : Ordinal) {b : Ordinal} (hb : 0 < b) : a ≤ a * b := by convert mul_le_mul_left' (one_le_iff_pos.2 hb) a rw [mul_one a] theorem le_mul_right (a : Ordinal) {b : Ordinal} (hb : 0 < b) : a ≤ b * a := by convert mul_le_mul_right' (one_le_iff_pos.2 hb) a rw [one_mul a] private theorem mul_le_of_limit_aux {α β r s} [IsWellOrder α r] [IsWellOrder β s] {c} (h : IsLimit (type s)) (H : ∀ b' < type s, type r * b' ≤ c) (l : c < type r * type s) : False := by suffices ∀ a b, Prod.Lex s r (b, a) (enum _ ⟨_, l⟩) by obtain ⟨b, a⟩ := enum _ ⟨_, l⟩ exact irrefl _ (this _ _) intro a b rw [← typein_lt_typein (Prod.Lex s r), typein_enum] have := H _ (h.succ_lt (typein_lt_type s b)) rw [mul_succ] at this have := ((add_lt_add_iff_left _).2 (typein_lt_type _ a)).trans_le this refine (RelEmbedding.ofMonotone (fun a => ?_) fun a b => ?_).ordinal_type_le.trans_lt this · rcases a with ⟨⟨b', a'⟩, h⟩ by_cases e : b = b' · refine Sum.inr ⟨a', ?_⟩ subst e obtain ⟨-, -, h⟩ \| ⟨-, h⟩ := h · exact (irrefl _ h).elim · exact h · refine Sum.inl (⟨b', ?_⟩, a') obtain ⟨-, -, h⟩ \| ⟨e, h⟩ := h · exact h · exact (e rfl).elim · rcases a with ⟨⟨b₁, a₁⟩, h₁⟩ rcases b with ⟨⟨b₂, a₂⟩, h₂⟩ intro h by_cases e₁ : b = b₁ <;> by_cases e₂ : b = b₂ · substs b₁ b₂ simpa only [subrel_val, Prod.lex_def, @irrefl _ s _ b, true_and, false_or, eq_self_iff_true, dif_pos, Sum.lex_inr_inr] using h · subst b₁ simp only [subrel_val, Prod.lex_def, e₂, Prod.lex_def, dif_pos, subrel_val, eq_self_iff_true, or_false, dif_neg, not_false_iff, Sum.lex_inr_inl, false_and] at h ⊢ obtain ⟨-, -, h₂_h⟩ \| e₂ := h₂ <;> [exact asymm h h₂_h; exact e₂ rfl] · simp [e₂, dif_neg e₁, show b₂ ≠ b₁ from e₂ ▸ e₁] · simpa only [dif_neg e₁, dif_neg e₂, Prod.lex_def, subrel_val, Subtype.mk_eq_mk, Sum.lex_inl_inl] using h theorem mul_le_of_limit {a b c : Ordinal} (h : IsLimit b) : a * b ≤ c ↔ ∀ b' < b, a * b' ≤ c := ⟨fun h _ l => (mul_le_mul_left' l.le _).trans h, fun H => -- Porting note: `induction` tactics are required because of the parser bug. le_of_not_lt <\| by induction a using inductionOn with \| H α r => induction b using inductionOn with \| H β s => exact mul_le_of_limit_aux h H⟩ theorem isNormal_mul_right {a : Ordinal} (h : 0 < a) : IsNormal (a * ·) := -- Porting note (https://github.com/leanprover-community/mathlib4/issues/12129): additional beta reduction needed ⟨fun b => by beta_reduce rw [mul_succ] simpa only [add_zero] using (add_lt_add_iff_left (a * b)).2 h, fun _ l _ => mul_le_of_limit l⟩ theorem lt_mul_of_limit {a b c : Ordinal} (h : IsLimit c) : a < b * c ↔ ∃ c' < c, a < b * c' := by -- Porting note: `bex_def` is required. simpa only [not_forall₂, not_le, bex_def] using not_congr (@mul_le_of_limit b c a h) theorem mul_lt_mul_iff_left {a b c : Ordinal} (a0 : 0 < a) : a * b < a * c ↔ b < c := (isNormal_mul_right a0).lt_iff theorem mul_le_mul_iff_left {a b c : Ordinal} (a0 : 0 < a) : a * b ≤ a * c ↔ b ≤ c := (isNormal_mul_right a0).le_iff theorem mul_lt_mul_of_pos_left {a b c : Ordinal} (h : a < b) (c0 : 0 < c) : c * a < c * b := (mul_lt_mul_iff_left c0).2 h theorem mul_pos {a b : Ordinal} (h₁ : 0 < a) (h₂ : 0 < b) : 0 < a * b := by simpa only [mul_zero] using mul_lt_mul_of_pos_left h₂ h₁ theorem mul_ne_zero {a b : Ordinal} : a ≠ 0 → b ≠ 0 → a * b ≠ 0 := by simpa only [Ordinal.pos_iff_ne_zero] using mul_pos theorem le_of_mul_le_mul_left {a b c : Ordinal} (h : c * a ≤ c * b) (h0 : 0 < c) : a ≤ b := le_imp_le_of_lt_imp_lt (fun h' => mul_lt_mul_of_pos_left h' h0) h theorem mul_right_inj {a b c : Ordinal} (a0 : 0 < a) : a * b = a * c ↔ b = c := (isNormal_mul_right a0).inj theorem isLimit_mul {a b : Ordinal} (a0 : 0 < a) : IsLimit b → IsLimit (a * b) := (isNormal_mul_right a0).isLimit theorem isLimit_mul_left {a b : Ordinal} (l : IsLimit a) (b0 : 0 < b) : IsLimit (a * b) := by rcases zero_or_succ_or_limit b with (rfl \| ⟨b, rfl⟩ \| lb) · exact b0.false.elim · rw [mul_succ] exact isLimit_add _ l · exact isLimit_mul l.pos lb theorem smul_eq_mul : ∀ (n : ℕ) (a : Ordinal), n • a = a * n \| 0, a => by rw [zero_nsmul, Nat.cast_zero, mul_zero] \| n + 1, a => by rw [succ_nsmul, Nat.cast_add, mul_add, Nat.cast_one, mul_one, smul_eq_mul n] private theorem add_mul_limit_aux {a b c : Ordinal} (ba : b + a = a) (l : IsLimit c) (IH : ∀ c' < c, (a + b) * succ c' = a * succ c' + b) : (a + b) * c = a * c := le_antisymm ((mul_le_of_limit l).2 fun c' h => by apply (mul_le_mul_left' (le_succ c') _).trans rw [IH _ h] apply (add_le_add_left _ _).trans · rw [← mul_succ] exact mul_le_mul_left' (succ_le_of_lt <\| l.succ_lt h) _ · rw [← ba] exact le_add_right _ _) (mul_le_mul_right' (le_add_right _ _) _) theorem add_mul_succ {a b : Ordinal} (c) (ba : b + a = a) : (a + b) * succ c = a * succ c + b := by induction c using limitRecOn with \| zero => simp only [succ_zero, mul_one] \| succ c IH => rw [mul_succ, IH, ← add_assoc, add_assoc _ b, ba, ← mul_succ] \| isLimit c l IH => rw [mul_succ, add_mul_limit_aux ba l IH, mul_succ, add_assoc] theorem add_mul_limit {a b c : Ordinal} (ba : b + a = a) (l : IsLimit c) : (a + b) * c = a * c := add_mul_limit_aux ba l fun c' _ => add_mul_succ c' ba /-! ### Division on ordinals -/ /-- The set in the definition of division is nonempty. -/ private theorem div_nonempty {a b : Ordinal} (h : b ≠ 0) : { o \| a < b * succ o }.Nonempty := ⟨a, (succ_le_iff (a := a) (b := b * succ a)).1 <\| by simpa only [succ_zero, one_mul] using mul_le_mul_right' (succ_le_of_lt (Ordinal.pos_iff_ne_zero.2 h)) (succ a)⟩ /-- `a / b` is the unique ordinal `o` satisfying `a = b * o + o'` with `o' < b`. -/ instance div : Div Ordinal := ⟨fun a b => if b = 0 then 0 else sInf { o \| a < b * succ o }⟩ @[simp] theorem div_zero (a : Ordinal) : a / 0 = 0 := dif_pos rfl private theorem div_def (a) {b : Ordinal} (h : b ≠ 0) : a / b = sInf { o \| a < b * succ o } := dif_neg h theorem lt_mul_succ_div (a) {b : Ordinal} (h : b ≠ 0) : a < b * succ (a / b) := by rw [div_def a h]; exact csInf_mem (div_nonempty h) theorem lt_mul_div_add (a) {b : Ordinal} (h : b ≠ 0) : a < b * (a / b) + b := by simpa only [mul_succ] using lt_mul_succ_div a h theorem div_le {a b c : Ordinal} (b0 : b ≠ 0) : a / b ≤ c ↔ a < b * succ c := ⟨fun h => (lt_mul_succ_div a b0).trans_le (mul_le_mul_left' (succ_le_succ_iff.2 h) _), fun h => by rw [div_def a b0]; exact csInf_le' h⟩ theorem lt_div {a b c : Ordinal} (h : c ≠ 0) : a < b / c ↔ c * succ a ≤ b := by rw [← not_le, div_le h, not_lt] theorem div_pos {b c : Ordinal} (h : c ≠ 0) : 0 < b / c ↔ c ≤ b := by simp [lt_div h] theorem le_div {a b c : Ordinal} (c0 : c ≠ 0) : a ≤ b / c ↔ c * a ≤ b := by induction a using limitRecOn with \| zero => simp only [mul_zero, Ordinal.zero_le] \| succ _ _ => rw [succ_le_iff, lt_div c0] \| isLimit _ h₁ h₂ => revert h₁ h₂ simp +contextual only [mul_le_of_limit, limit_le, forall_true_iff] theorem div_lt {a b c : Ordinal} (b0 : b ≠ 0) : a / b < c ↔ a < b * c := lt_iff_lt_of_le_iff_le <\| le_div b0 theorem div_le_of_le_mul {a b c : Ordinal} (h : a ≤ b * c) : a / b ≤ c := if b0 : b = 0 then by simp only [b0, div_zero, Ordinal.zero_le] else (div_le b0).2 <\| h.trans_lt <\| mul_lt_mul_of_pos_left (lt_succ c) (Ordinal.pos_iff_ne_zero.2 b0) theorem mul_lt_of_lt_div {a b c : Ordinal} : a < b / c → c * a < b := lt_imp_lt_of_le_imp_le div_le_of_le_mul @[simp] theorem zero_div (a : Ordinal) : 0 / a = 0 := Ordinal.le_zero.1 <\| div_le_of_le_mul <\| Ordinal.zero_le _ theorem mul_div_le (a b : Ordinal) : b * (a / b) ≤ a := if b0 : b = 0 then by simp only [b0, zero_mul, Ordinal.zero_le] else (le_div b0).1 le_rfl theorem div_le_left {a b : Ordinal} (h : a ≤ b) (c : Ordinal) : a / c ≤ b / c := by obtain rfl \| hc := eq_or_ne c 0 · rw [div_zero, div_zero] · rw [le_div hc] exact (mul_div_le a c).trans h theorem mul_add_div (a) {b : Ordinal} (b0 : b ≠ 0) (c) : (b * a + c) / b = a + c / b := by apply le_antisymm · apply (div_le b0).2 rw [mul_succ, mul_add, add_assoc, add_lt_add_iff_left] apply lt_mul_div_add _ b0 · rw [le_div b0, mul_add, add_le_add_iff_left] apply mul_div_le theorem div_eq_zero_of_lt {a b : Ordinal} (h : a < b) : a / b = 0 := by rw [← Ordinal.le_zero, div_le <\| Ordinal.pos_iff_ne_zero.1 <\| (Ordinal.zero_le _).trans_lt h] simpa only [succ_zero, mul_one] using h @[simp] theorem mul_div_cancel (a) {b : Ordinal} (b0 : b ≠ 0) : b * a / b = a := by simpa only [add_zero, zero_div] using mul_add_div a b0 0 theorem mul_add_div_mul {a c : Ordinal} (hc : c < a) (b d : Ordinal) : (a * b + c) / (a * d) = b / d := by have ha : a ≠ 0 := ((Ordinal.zero_le c).trans_lt hc).ne' obtain rfl \| hd := eq_or_ne d 0 · rw [mul_zero, div_zero, div_zero] · have H := mul_ne_zero ha hd apply le_antisymm · rw [← lt_succ_iff, div_lt H, mul_assoc] · apply (add_lt_add_left hc _).trans_le rw [← mul_succ] apply mul_le_mul_left' rw [succ_le_iff] exact lt_mul_succ_div b hd · rw [le_div H, mul_assoc] exact (mul_le_mul_left' (mul_div_le b d) a).trans (le_add_right _ c) theorem mul_div_mul_cancel {a : Ordinal} (ha : a ≠ 0) (b c) : a * b / (a * c) = b / c := by convert mul_add_div_mul (Ordinal.pos_iff_ne_zero.2 ha) b c using 1 rw [add_zero] @[simp] theorem div_one (a : Ordinal) : a / 1 = a := by simpa only [one_mul] using mul_div_cancel a Ordinal.one_ne_zero @[simp] theorem div_self {a : Ordinal} (h : a ≠ 0) : a / a = 1 := by simpa only [mul_one] using mul_div_cancel 1 h theorem mul_sub (a b c : Ordinal) : a * (b - c) = a * b - a * c := if a0 : a = 0 then by simp only [a0, zero_mul, sub_self] else eq_of_forall_ge_iff fun d => by rw [sub_le, ← le_div a0, sub_le, ← le_div a0, mul_add_div _ a0] theorem isLimit_add_iff {a b} : IsLimit (a + b) ↔ IsLimit b ∨ b = 0 ∧ IsLimit a := by constructor <;> intro h · by_cases h' : b = 0 · rw [h', add_zero] at h right exact ⟨h', h⟩ left rw [← add_sub_cancel a b] apply isLimit_sub h suffices a + 0 < a + b by simpa only [add_zero] using this rwa [add_lt_add_iff_left, Ordinal.pos_iff_ne_zero] rcases h with (h \| ⟨rfl, h⟩) · exact isLimit_add a h · simpa only [add_zero] theorem dvd_add_iff : ∀ {a b c : Ordinal}, a ∣ b → (a ∣ b + c ↔ a ∣ c) \| a, _, c, ⟨b, rfl⟩ => ⟨fun ⟨d, e⟩ => ⟨d - b, by rw [mul_sub, ← e, add_sub_cancel]⟩, fun ⟨d, e⟩ => by rw [e, ← mul_add] apply dvd_mul_right⟩ theorem div_mul_cancel : ∀ {a b : Ordinal}, a ≠ 0 → a ∣ b → a * (b / a) = b \| a, _, a0, ⟨b, rfl⟩ => by rw [mul_div_cancel _ a0] theorem le_of_dvd : ∀ {a b : Ordinal}, b ≠ 0 → a ∣ b → a ≤ b -- Porting note: `⟨b, rfl⟩ => by` → `⟨b, e⟩ => by subst e` \| a, _, b0, ⟨b, e⟩ => by subst e -- Porting note: `Ne` is required. simpa only [mul_one] using mul_le_mul_left' (one_le_iff_ne_zero.2 fun h : b = 0 => by simp only [h, mul_zero, Ne, not_true_eq_false] at b0) a theorem dvd_antisymm {a b : Ordinal} (h₁ : a ∣ b) (h₂ : b ∣ a) : a = b := if a0 : a = 0 then by subst a; exact (eq_zero_of_zero_dvd h₁).symm else if b0 : b = 0 then by subst b; exact eq_zero_of_zero_dvd h₂ else (le_of_dvd b0 h₁).antisymm (le_of_dvd a0 h₂) instance isAntisymm : IsAntisymm Ordinal (· ∣ ·) := ⟨@dvd_antisymm⟩ /-- `a % b` is the unique ordinal `o'` satisfying `a = b * o + o'` with `o' < b`. -/ instance mod : Mod Ordinal := ⟨fun a b => a - b * (a / b)⟩ theorem mod_def (a b : Ordinal) : a % b = a - b * (a / b) := rfl theorem mod_le (a b : Ordinal) : a % b ≤ a := sub_le_self a _ @[simp] theorem mod_zero (a : Ordinal) : a % 0 = a := by simp only [mod_def, div_zero, zero_mul, sub_zero] theorem mod_eq_of_lt {a b : Ordinal} (h : a < b) : a % b = a := by simp only [mod_def, div_eq_zero_of_lt h, mul_zero, sub_zero] @[simp] theorem zero_mod (b : Ordinal) : 0 % b = 0 := by simp only [mod_def, zero_div, mul_zero, sub_self] theorem div_add_mod (a b : Ordinal) : b * (a / b) + a % b = a := Ordinal.add_sub_cancel_of_le <\| mul_div_le _ _ theorem mod_lt (a) {b : Ordinal} (h : b ≠ 0) : a % b < b := (add_lt_add_iff_left (b * (a / b))).1 <\| by rw [div_add_mod]; exact lt_mul_div_add a h @[simp] theorem mod_self (a : Ordinal) : a % a = 0 := if a0 : a = 0 then by simp only [a0, zero_mod] else by simp only [mod_def, div_self a0, mul_one, sub_self] @[simp] theorem mod_one (a : Ordinal) : a % 1 = 0 := by simp only [mod_def, div_one, one_mul, sub_self] theorem dvd_of_mod_eq_zero {a b : Ordinal} (H : a % b = 0) : b ∣ a := ⟨a / b, by simpa [H] using (div_add_mod a b).symm⟩ theorem mod_eq_zero_of_dvd {a b : Ordinal} (H : b ∣ a) : a % b = 0 := by rcases H with ⟨c, rfl⟩ rcases eq_or_ne b 0 with (rfl \| hb) · simp · simp [mod_def, hb] theorem dvd_iff_mod_eq_zero {a b : Ordinal} : b ∣ a ↔ a % b = 0 := ⟨mod_eq_zero_of_dvd, dvd_of_mod_eq_zero⟩ @[simp] theorem mul_add_mod_self (x y z : Ordinal) : (x * y + z) % x = z % x := by rcases eq_or_ne x 0 with rfl \| hx · simp · rwa [mod_def, mul_add_div, mul_add, ← sub_sub, add_sub_cancel, mod_def] @[simp] theorem mul_mod (x y : Ordinal) : x * y % x = 0 := by simpa using mul_add_mod_self x y 0 theorem mul_add_mod_mul {w x : Ordinal} (hw : w < x) (y z : Ordinal) : (x * y + w) % (x * z) = x * (y % z) + w := by rw [mod_def, mul_add_div_mul hw] apply sub_eq_of_add_eq rw [← add_assoc, mul_assoc, ← mul_add, div_add_mod] theorem mul_mod_mul (x y z : Ordinal) : (x * y) % (x * z) = x * (y % z) := by obtain rfl \| hx := Ordinal.eq_zero_or_pos x · simp · convert mul_add_mod_mul hx y z using 1 <;> rw [add_zero] theorem mod_mod_of_dvd (a : Ordinal) {b c : Ordinal} (h : c ∣ b) : a % b % c = a % c := by nth_rw 2 [← div_add_mod a b] rcases h with ⟨d, rfl⟩ rw [mul_assoc, mul_add_mod_self] @[simp] theorem mod_mod (a b : Ordinal) : a % b % b = a % b := mod_mod_of_dvd a dvd_rfl /-! ### Casting naturals into ordinals, compatibility with operations -/ instance instCharZero : CharZero Ordinal := by refine ⟨fun a b h ↦ ?_⟩ rwa [← Cardinal.ord_nat, ← Cardinal.ord_nat, Cardinal.ord_inj, Nat.cast_inj] at h @[simp] theorem one_add_natCast (m : ℕ) : 1 + (m : Ordinal) = succ m := by rw [← Nat.cast_one, ← Nat.cast_add, add_comm] rfl @[simp] theorem one_add_ofNat (m : ℕ) [m.AtLeastTwo] : 1 + (ofNat(m) : Ordinal) = Order.succ (OfNat.ofNat m : Ordinal) := one_add_natCast m @[simp, norm_cast] theorem natCast_mul (m : ℕ) : ∀ n : ℕ, ((m * n : ℕ) : Ordinal) = m * n \| 0 => by simp \| n + 1 => by rw [Nat.mul_succ, Nat.cast_add, natCast_mul m n, Nat.cast_succ, mul_add_one] @[simp, norm_cast] theorem natCast_sub (m n : ℕ) : ((m - n : ℕ) : Ordinal) = m - n := by rcases le_total m n with h \| h · rw [tsub_eq_zero_iff_le.2 h, Ordinal.sub_eq_zero_iff_le.2 (Nat.cast_le.2 h), Nat.cast_zero] · rw [← add_left_cancel_iff (a := ↑n), ← Nat.cast_add, add_tsub_cancel_of_le h, Ordinal.add_sub_cancel_of_le (Nat.cast_le.2 h)] @[simp, norm_cast] theorem natCast_div (m n : ℕ) : ((m / n : ℕ) : Ordinal) = m / n := by rcases eq_or_ne n 0 with (rfl \| hn) · simp · have hn' : (n : Ordinal) ≠ 0 := Nat.cast_ne_zero.2 hn apply le_antisymm · rw [le_div hn', ← natCast_mul, Nat.cast_le, mul_comm] apply Nat.div_mul_le_self · rw [div_le hn', ← add_one_eq_succ, ← Nat.cast_succ, ← natCast_mul, Nat.cast_lt, mul_comm, ← Nat.div_lt_iff_lt_mul (Nat.pos_of_ne_zero hn)] apply Nat.lt_succ_self @[simp, norm_cast] theorem natCast_mod (m n : ℕ) : ((m % n : ℕ) : Ordinal) = m % n := by rw [← add_left_cancel_iff, div_add_mod, ← natCast_div, ← natCast_mul, ← Nat.cast_add, Nat.div_add_mod] @[simp] theorem lift_natCast : ∀ n : ℕ, lift.{u, v} n = n \| 0 => by simp \| n + 1 => by simp [lift_natCast n] @[simp] theorem lift_ofNat (n : ℕ) [n.AtLeastTwo] : lift.{u, v} ofNat(n) = OfNat.ofNat n := lift_natCast n theorem lt_omega0 {o : Ordinal} : o < ω ↔ ∃ n : ℕ, o = n := by simp_rw [← Cardinal.ord_aleph0, Cardinal.lt_ord, lt_aleph0, card_eq_nat] theorem nat_lt_omega0 (n : ℕ) : ↑n < ω := lt_omega0.2 ⟨_, rfl⟩ theorem eq_nat_or_omega0_le (o : Ordinal) : (∃ n : ℕ, o = n) ∨ ω ≤ o := by obtain ho \| ho := lt_or_le o ω · exact Or.inl <\| lt_omega0.1 ho · exact Or.inr ho theorem omega0_pos : 0 < ω := nat_lt_omega0 0 theorem omega0_ne_zero : ω ≠ 0 := omega0_pos.ne' theorem one_lt_omega0 : 1 < ω := by simpa only [Nat.cast_one] using nat_lt_omega0 1 theorem isLimit_omega0 : IsLimit ω := by rw [isLimit_iff, isSuccPrelimit_iff_succ_lt] refine ⟨omega0_ne_zero, fun o h => ?_⟩ obtain ⟨n, rfl⟩ := lt_omega0.1 h exact nat_lt_omega0 (n + 1) theorem omega0_le {o : Ordinal} : ω ≤ o ↔ ∀ n : ℕ, ↑n ≤ o := ⟨fun h n => (nat_lt_omega0 _).le.trans h, fun H => le_of_forall_lt fun a h => by let ⟨n, e⟩ := lt_omega0.1 h rw [e, ← succ_le_iff]; exact H (n + 1)⟩ theorem nat_lt_limit {o} (h : IsLimit o) : ∀ n : ℕ, ↑n < o \| 0 => h.pos \| n + 1 => h.succ_lt (nat_lt_limit h n) theorem omega0_le_of_isLimit {o} (h : IsLimit o) : ω ≤ o := omega0_le.2 fun n => le_of_lt <\| nat_lt_limit h n theorem natCast_add_omega0 (n : ℕ) : n + ω = ω := by refine le_antisymm (le_of_forall_lt fun a ha ↦ ?_) (le_add_left _ _) obtain ⟨b, hb', hb⟩ := (lt_add_iff omega0_ne_zero).1 ha obtain ⟨m, rfl⟩ := lt_omega0.1 hb' apply hb.trans_lt exact_mod_cast nat_lt_omega0 (n + m) theorem one_add_omega0 : 1 + ω = ω := mod_cast natCast_add_omega0 1 theorem add_omega0 {a : Ordinal} (h : a < ω) : a + ω = ω := by obtain ⟨n, rfl⟩ := lt_omega0.1 h exact natCast_add_omega0 n @[simp] theorem natCast_add_of_omega0_le {o} (h : ω ≤ o) (n : ℕ) : n + o = o := by rw [← Ordinal.add_sub_cancel_of_le h, ← add_assoc, natCast_add_omega0] @[simp] theorem one_add_of_omega0_le {o} (h : ω ≤ o) : 1 + o = o := mod_cast natCast_add_of_omega0_le h 1 open Ordinal theorem isLimit_iff_omega0_dvd {a : Ordinal} : IsLimit a ↔ a ≠ 0 ∧ ω ∣ a := by refine ⟨fun l => ⟨l.ne_zero, ⟨a / ω, le_antisymm ?_ (mul_div_le _ _)⟩⟩, fun h => ?_⟩ · refine (limit_le l).2 fun x hx => le_of_lt ?_ rw [← div_lt omega0_ne_zero, ← succ_le_iff, le_div omega0_ne_zero, mul_succ, add_le_of_limit isLimit_omega0] intro b hb rcases lt_omega0.1 hb with ⟨n, rfl⟩ exact (add_le_add_right (mul_div_le _ _) _).trans (lt_sub.1 <\| nat_lt_limit (isLimit_sub l hx) _).le · rcases h with ⟨a0, b, rfl⟩ refine isLimit_mul_left isLimit_omega0 (Ordinal.pos_iff_ne_zero.2 <\| mt ?_ a0) intro e simp only [e, mul_zero] @[simp] theorem natCast_mod_omega0 (n : ℕ) : n % ω = n := mod_eq_of_lt (nat_lt_omega0 n) end Ordinal namespace Cardinal open Ordinal @[simp] theorem add_one_of_aleph0_le {c} (h : ℵ₀ ≤ c) : c + 1 = c := by rw [add_comm, ← card_ord c, ← card_one, ← card_add, one_add_of_omega0_le] rwa [← ord_aleph0, ord_le_ord] theorem isLimit_ord {c} (co : ℵ₀ ≤ c) : (ord c).IsLimit := by rw [isLimit_iff, isSuccPrelimit_iff_succ_lt] refine ⟨fun h => aleph0_ne_zero ?_, fun a => lt_imp_lt_of_le_imp_le fun h => ?_⟩ · rw [← Ordinal.le_zero, ord_le] at h simpa only [card_zero, nonpos_iff_eq_zero] using co.trans h · rw [ord_le] at h ⊢ rwa [← @add_one_of_aleph0_le (card a), ← card_succ] rw [← ord_le, ← le_succ_of_isLimit, ord_le] · exact co.trans h · rw [ord_aleph0] exact Ordinal.isLimit_omega0 theorem noMaxOrder {c} (h : ℵ₀ ≤ c) : NoMaxOrder c.ord.toType := toType_noMax_of_succ_lt fun _ ↦ (isLimit_ord h).succ_lt end Cardinal		Mathlib/SetTheory/Ordinal/Arithmetic.lean	1,518	1,522
/- Copyright (c) 2023 David Loeffler. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: David Loeffler -/ import Mathlib.NumberTheory.ModularForms.JacobiTheta.TwoVariable import Mathlib.Analysis.Complex.UpperHalfPlane.Basic /-! # Jacobi's theta function This file defines the one-variable Jacobi theta function $$\theta(\tau) = \sum_{n \in \mathbb{Z}} \exp (i \pi n ^ 2 \tau),$$ and proves the modular transformation properties `θ (τ + 2) = θ τ` and `θ (-1 / τ) = (-I * τ) ^ (1 / 2) * θ τ`, using Poisson's summation formula for the latter. We also show that `θ` is differentiable on `ℍ`, and `θ(τ) - 1` has exponential decay as `im τ → ∞`. -/ open Complex Real Asymptotics Filter Topology open scoped Real UpperHalfPlane /-- Jacobi's one-variable theta function `∑' (n : ℤ), exp (π * I * n ^ 2 * τ)`. -/ noncomputable def jacobiTheta (τ : ℂ) : ℂ := ∑' n : ℤ, cexp (π * I * (n : ℂ) ^ 2 * τ) lemma jacobiTheta_eq_jacobiTheta₂ (τ : ℂ) : jacobiTheta τ = jacobiTheta₂ 0 τ := tsum_congr (by simp [jacobiTheta₂_term]) theorem jacobiTheta_two_add (τ : ℂ) : jacobiTheta (2 + τ) = jacobiTheta τ := by simp_rw [jacobiTheta_eq_jacobiTheta₂, add_comm, jacobiTheta₂_add_right] theorem jacobiTheta_T_sq_smul (τ : ℍ) : jacobiTheta (ModularGroup.T ^ 2 • τ :) = jacobiTheta τ := by suffices (ModularGroup.T ^ 2 • τ :) = (2 : ℂ) + ↑τ by simp_rw [this, jacobiTheta_two_add] have : ModularGroup.T ^ (2 : ℕ) = ModularGroup.T ^ (2 : ℤ) := rfl simp_rw [this, UpperHalfPlane.modular_T_zpow_smul, UpperHalfPlane.coe_vadd] norm_cast theorem jacobiTheta_S_smul (τ : ℍ) : jacobiTheta ↑(ModularGroup.S • τ) = (-I * τ) ^ (1 / 2 : ℂ) * jacobiTheta τ := by have h0 : (τ : ℂ) ≠ 0 := ne_of_apply_ne im (zero_im.symm ▸ ne_of_gt τ.2) have h1 : (-I * τ) ^ (1 / 2 : ℂ) ≠ 0 := by rw [Ne, cpow_eq_zero_iff, not_and_or] exact Or.inl <\| mul_ne_zero (neg_ne_zero.mpr I_ne_zero) h0 simp_rw [UpperHalfPlane.modular_S_smul, jacobiTheta_eq_jacobiTheta₂, ← ofReal_zero] norm_cast simp_rw [jacobiTheta₂_functional_equation 0 τ, zero_pow two_ne_zero, mul_zero, zero_div, Complex.exp_zero, mul_one, ← mul_assoc, mul_one_div, div_self h1, one_mul, UpperHalfPlane.coe_mk, inv_neg, neg_div, one_div] theorem norm_exp_mul_sq_le {τ : ℂ} (hτ : 0 < τ.im) (n : ℤ) : ‖cexp (π * I * (n : ℂ) ^ 2 * τ)‖ ≤ rexp (-π * τ.im) ^ n.natAbs := by let y := rexp (-π * τ.im) have h : y < 1 := exp_lt_one_iff.mpr (mul_neg_of_neg_of_pos (neg_lt_zero.mpr pi_pos) hτ) refine (le_of_eq ?_).trans (?_ : y ^ n ^ 2 ≤ _) · rw [norm_exp] have : (π * I * n ^ 2 * τ : ℂ).re = -π * τ.im * (n : ℝ) ^ 2 := by rw [(by push_cast; ring : (π * I * n ^ 2 * τ : ℂ) = (π * n ^ 2 : ℝ) * (τ * I)), re_ofReal_mul, mul_I_re] ring obtain ⟨m, hm⟩ := Int.eq_ofNat_of_zero_le (sq_nonneg n) rw [this, exp_mul, ← Int.cast_pow, rpow_intCast, hm, zpow_natCast] · have : n ^ 2 = (n.natAbs ^ 2 :) := by rw [Nat.cast_pow, Int.natAbs_sq] rw [this, zpow_natCast] exact pow_le_pow_of_le_one (exp_pos _).le h.le ((sq n.natAbs).symm ▸ n.natAbs.le_mul_self) theorem hasSum_nat_jacobiTheta {τ : ℂ} (hτ : 0 < im τ) : HasSum (fun n : ℕ => cexp (π * I * ((n : ℂ) + 1) ^ 2 * τ)) ((jacobiTheta τ - 1) / 2) := by have := hasSum_jacobiTheta₂_term 0 hτ simp_rw [jacobiTheta₂_term, mul_zero, zero_add, ← jacobiTheta_eq_jacobiTheta₂] at this have := this.nat_add_neg rw [← hasSum_nat_add_iff' 1] at this simp_rw [Finset.sum_range_one, Int.cast_neg, Int.cast_natCast, Nat.cast_zero, neg_zero, Int.cast_zero, sq (0 : ℂ), mul_zero, zero_mul, neg_sq, ← mul_two,	Complex.exp_zero, add_sub_assoc, (by norm_num : (1 : ℂ) - 1 * 2 = -1), ← sub_eq_add_neg, Nat.cast_add, Nat.cast_one] at this convert this.div_const 2 using 1 simp_rw [mul_div_cancel_right₀ _ (two_ne_zero' ℂ)] theorem jacobiTheta_eq_tsum_nat {τ : ℂ} (hτ : 0 < im τ) : jacobiTheta τ = ↑1 + ↑2 * ∑' n : ℕ, cexp (π * I * ((n : ℂ) + 1) ^ 2 * τ) := by rw [(hasSum_nat_jacobiTheta hτ).tsum_eq, mul_div_cancel₀ _ (two_ne_zero' ℂ), ← add_sub_assoc, add_sub_cancel_left] /-- An explicit upper bound for `‖jacobiTheta τ - 1‖`. -/ theorem norm_jacobiTheta_sub_one_le {τ : ℂ} (hτ : 0 < im τ) :	Mathlib/NumberTheory/ModularForms/JacobiTheta/OneVariable.lean	75	86
/- Copyright (c) 2014 Parikshit Khanna. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Parikshit Khanna, Jeremy Avigad, Leonardo de Moura, Floris van Doorn, Mario Carneiro -/ import Mathlib.Control.Basic import Mathlib.Data.Nat.Basic import Mathlib.Data.Option.Basic import Mathlib.Data.List.Defs import Mathlib.Data.List.Monad import Mathlib.Logic.OpClass import Mathlib.Logic.Unique import Mathlib.Order.Basic import Mathlib.Tactic.Common /-! # Basic properties of lists -/ assert_not_exists GroupWithZero assert_not_exists Lattice assert_not_exists Prod.swap_eq_iff_eq_swap assert_not_exists Ring assert_not_exists Set.range open Function open Nat hiding one_pos namespace List universe u v w variable {ι : Type*} {α : Type u} {β : Type v} {γ : Type w} {l₁ l₂ : List α} /-- There is only one list of an empty type -/ instance uniqueOfIsEmpty [IsEmpty α] : Unique (List α) := { instInhabitedList with uniq := fun l => match l with \| [] => rfl \| a :: _ => isEmptyElim a } instance : Std.LawfulIdentity (α := List α) Append.append [] where left_id := nil_append right_id := append_nil instance : Std.Associative (α := List α) Append.append where assoc := append_assoc @[simp] theorem cons_injective {a : α} : Injective (cons a) := fun _ _ => tail_eq_of_cons_eq theorem singleton_injective : Injective fun a : α => [a] := fun _ _ h => (cons_eq_cons.1 h).1 theorem set_of_mem_cons (l : List α) (a : α) : { x \| x ∈ a :: l } = insert a { x \| x ∈ l } := Set.ext fun _ => mem_cons /-! ### mem -/ theorem _root_.Decidable.List.eq_or_ne_mem_of_mem [DecidableEq α] {a b : α} {l : List α} (h : a ∈ b :: l) : a = b ∨ a ≠ b ∧ a ∈ l := by by_cases hab : a = b · exact Or.inl hab · exact ((List.mem_cons.1 h).elim Or.inl (fun h => Or.inr ⟨hab, h⟩)) lemma mem_pair {a b c : α} : a ∈ [b, c] ↔ a = b ∨ a = c := by rw [mem_cons, mem_singleton] -- The simpNF linter says that the LHS can be simplified via `List.mem_map`. -- However this is a higher priority lemma. -- It seems the side condition `hf` is not applied by `simpNF`. -- https://github.com/leanprover/std4/issues/207 @[simp 1100, nolint simpNF] theorem mem_map_of_injective {f : α → β} (H : Injective f) {a : α} {l : List α} : f a ∈ map f l ↔ a ∈ l := ⟨fun m => let ⟨_, m', e⟩ := exists_of_mem_map m; H e ▸ m', mem_map_of_mem⟩ @[simp] theorem _root_.Function.Involutive.exists_mem_and_apply_eq_iff {f : α → α} (hf : Function.Involutive f) (x : α) (l : List α) : (∃ y : α, y ∈ l ∧ f y = x) ↔ f x ∈ l := ⟨by rintro ⟨y, h, rfl⟩; rwa [hf y], fun h => ⟨f x, h, hf _⟩⟩ theorem mem_map_of_involutive {f : α → α} (hf : Involutive f) {a : α} {l : List α} : a ∈ map f l ↔ f a ∈ l := by rw [mem_map, hf.exists_mem_and_apply_eq_iff] /-! ### length -/ alias ⟨_, length_pos_of_ne_nil⟩ := length_pos_iff theorem length_pos_iff_ne_nil {l : List α} : 0 < length l ↔ l ≠ [] := ⟨ne_nil_of_length_pos, length_pos_of_ne_nil⟩ theorem exists_of_length_succ {n} : ∀ l : List α, l.length = n + 1 → ∃ h t, l = h :: t \| [], H => absurd H.symm <\| succ_ne_zero n \| h :: t, _ => ⟨h, t, rfl⟩ @[simp] lemma length_injective_iff : Injective (List.length : List α → ℕ) ↔ Subsingleton α := by constructor · intro h; refine ⟨fun x y => ?_⟩; (suffices [x] = [y] by simpa using this); apply h; rfl · intros hα l1 l2 hl induction l1 generalizing l2 <;> cases l2 · rfl · cases hl · cases hl · next ih _ _ => congr · subsingleton · apply ih; simpa using hl @[simp default+1] -- Raise priority above `length_injective_iff`. lemma length_injective [Subsingleton α] : Injective (length : List α → ℕ) := length_injective_iff.mpr inferInstance theorem length_eq_two {l : List α} : l.length = 2 ↔ ∃ a b, l = [a, b] := ⟨fun _ => let [a, b] := l; ⟨a, b, rfl⟩, fun ⟨_, _, e⟩ => e ▸ rfl⟩ theorem length_eq_three {l : List α} : l.length = 3 ↔ ∃ a b c, l = [a, b, c] := ⟨fun _ => let [a, b, c] := l; ⟨a, b, c, rfl⟩, fun ⟨_, _, _, e⟩ => e ▸ rfl⟩ /-! ### set-theoretic notation of lists -/ instance instSingletonList : Singleton α (List α) := ⟨fun x => [x]⟩ instance [DecidableEq α] : Insert α (List α) := ⟨List.insert⟩ instance [DecidableEq α] : LawfulSingleton α (List α) := { insert_empty_eq := fun x => show (if x ∈ ([] : List α) then [] else [x]) = [x] from if_neg not_mem_nil } theorem singleton_eq (x : α) : ({x} : List α) = [x] := rfl theorem insert_neg [DecidableEq α] {x : α} {l : List α} (h : x ∉ l) : Insert.insert x l = x :: l := insert_of_not_mem h theorem insert_pos [DecidableEq α] {x : α} {l : List α} (h : x ∈ l) : Insert.insert x l = l := insert_of_mem h theorem doubleton_eq [DecidableEq α] {x y : α} (h : x ≠ y) : ({x, y} : List α) = [x, y] := by rw [insert_neg, singleton_eq] rwa [singleton_eq, mem_singleton] /-! ### bounded quantifiers over lists -/ theorem forall_mem_of_forall_mem_cons {p : α → Prop} {a : α} {l : List α} (h : ∀ x ∈ a :: l, p x) : ∀ x ∈ l, p x := (forall_mem_cons.1 h).2 theorem exists_mem_cons_of {p : α → Prop} {a : α} (l : List α) (h : p a) : ∃ x ∈ a :: l, p x := ⟨a, mem_cons_self, h⟩ theorem exists_mem_cons_of_exists {p : α → Prop} {a : α} {l : List α} : (∃ x ∈ l, p x) → ∃ x ∈ a :: l, p x := fun ⟨x, xl, px⟩ => ⟨x, mem_cons_of_mem _ xl, px⟩ theorem or_exists_of_exists_mem_cons {p : α → Prop} {a : α} {l : List α} : (∃ x ∈ a :: l, p x) → p a ∨ ∃ x ∈ l, p x := fun ⟨x, xal, px⟩ => Or.elim (eq_or_mem_of_mem_cons xal) (fun h : x = a => by rw [← h]; left; exact px) fun h : x ∈ l => Or.inr ⟨x, h, px⟩ theorem exists_mem_cons_iff (p : α → Prop) (a : α) (l : List α) : (∃ x ∈ a :: l, p x) ↔ p a ∨ ∃ x ∈ l, p x := Iff.intro or_exists_of_exists_mem_cons fun h => Or.elim h (exists_mem_cons_of l) exists_mem_cons_of_exists /-! ### list subset -/ theorem cons_subset_of_subset_of_mem {a : α} {l m : List α} (ainm : a ∈ m) (lsubm : l ⊆ m) : a::l ⊆ m := cons_subset.2 ⟨ainm, lsubm⟩ theorem append_subset_of_subset_of_subset {l₁ l₂ l : List α} (l₁subl : l₁ ⊆ l) (l₂subl : l₂ ⊆ l) : l₁ ++ l₂ ⊆ l := fun _ h ↦ (mem_append.1 h).elim (@l₁subl _) (@l₂subl _) theorem map_subset_iff {l₁ l₂ : List α} (f : α → β) (h : Injective f) : map f l₁ ⊆ map f l₂ ↔ l₁ ⊆ l₂ := by refine ⟨?_, map_subset f⟩; intro h2 x hx rcases mem_map.1 (h2 (mem_map_of_mem hx)) with ⟨x', hx', hxx'⟩ cases h hxx'; exact hx' /-! ### append -/ theorem append_eq_has_append {L₁ L₂ : List α} : List.append L₁ L₂ = L₁ ++ L₂ := rfl theorem append_right_injective (s : List α) : Injective fun t ↦ s ++ t := fun _ _ ↦ append_cancel_left theorem append_left_injective (t : List α) : Injective fun s ↦ s ++ t := fun _ _ ↦ append_cancel_right /-! ### replicate -/ theorem eq_replicate_length {a : α} : ∀ {l : List α}, l = replicate l.length a ↔ ∀ b ∈ l, b = a \| [] => by simp \| (b :: l) => by simp [eq_replicate_length, replicate_succ] theorem replicate_add (m n) (a : α) : replicate (m + n) a = replicate m a ++ replicate n a := by rw [replicate_append_replicate] theorem replicate_subset_singleton (n) (a : α) : replicate n a ⊆ [a] := fun _ h => mem_singleton.2 (eq_of_mem_replicate h) theorem subset_singleton_iff {a : α} {L : List α} : L ⊆ [a] ↔ ∃ n, L = replicate n a := by simp only [eq_replicate_iff, subset_def, mem_singleton, exists_eq_left'] theorem replicate_right_injective {n : ℕ} (hn : n ≠ 0) : Injective (@replicate α n) := fun _ _ h => (eq_replicate_iff.1 h).2 _ <\| mem_replicate.2 ⟨hn, rfl⟩ theorem replicate_right_inj {a b : α} {n : ℕ} (hn : n ≠ 0) : replicate n a = replicate n b ↔ a = b := (replicate_right_injective hn).eq_iff theorem replicate_right_inj' {a b : α} : ∀ {n}, replicate n a = replicate n b ↔ n = 0 ∨ a = b \| 0 => by simp \| n + 1 => (replicate_right_inj n.succ_ne_zero).trans <\| by simp only [n.succ_ne_zero, false_or] theorem replicate_left_injective (a : α) : Injective (replicate · a) := LeftInverse.injective (length_replicate (n := ·)) theorem replicate_left_inj {a : α} {n m : ℕ} : replicate n a = replicate m a ↔ n = m := (replicate_left_injective a).eq_iff @[simp] theorem head?_flatten_replicate {n : ℕ} (h : n ≠ 0) (l : List α) : (List.replicate n l).flatten.head? = l.head? := by obtain ⟨n, rfl⟩ := Nat.exists_eq_succ_of_ne_zero h induction l <;> simp [replicate] @[simp] theorem getLast?_flatten_replicate {n : ℕ} (h : n ≠ 0) (l : List α) : (List.replicate n l).flatten.getLast? = l.getLast? := by rw [← List.head?_reverse, ← List.head?_reverse, List.reverse_flatten, List.map_replicate, List.reverse_replicate, head?_flatten_replicate h] /-! ### pure -/ theorem mem_pure (x y : α) : x ∈ (pure y : List α) ↔ x = y := by simp /-! ### bind -/ @[simp] theorem bind_eq_flatMap {α β} (f : α → List β) (l : List α) : l >>= f = l.flatMap f := rfl /-! ### concat -/ /-! ### reverse -/ theorem reverse_cons' (a : α) (l : List α) : reverse (a :: l) = concat (reverse l) a := by simp only [reverse_cons, concat_eq_append] theorem reverse_concat' (l : List α) (a : α) : (l ++ [a]).reverse = a :: l.reverse := by rw [reverse_append]; rfl @[simp] theorem reverse_singleton (a : α) : reverse [a] = [a] := rfl @[simp] theorem reverse_involutive : Involutive (@reverse α) := reverse_reverse @[simp] theorem reverse_injective : Injective (@reverse α) := reverse_involutive.injective theorem reverse_surjective : Surjective (@reverse α) := reverse_involutive.surjective theorem reverse_bijective : Bijective (@reverse α) := reverse_involutive.bijective theorem concat_eq_reverse_cons (a : α) (l : List α) : concat l a = reverse (a :: reverse l) := by simp only [concat_eq_append, reverse_cons, reverse_reverse] theorem map_reverseAux (f : α → β) (l₁ l₂ : List α) : map f (reverseAux l₁ l₂) = reverseAux (map f l₁) (map f l₂) := by simp only [reverseAux_eq, map_append, map_reverse] -- TODO: Rename `List.reverse_perm` to `List.reverse_perm_self` @[simp] lemma reverse_perm' : l₁.reverse ~ l₂ ↔ l₁ ~ l₂ where mp := l₁.reverse_perm.symm.trans mpr := l₁.reverse_perm.trans @[simp] lemma perm_reverse : l₁ ~ l₂.reverse ↔ l₁ ~ l₂ where mp hl := hl.trans l₂.reverse_perm mpr hl := hl.trans l₂.reverse_perm.symm /-! ### getLast -/ attribute [simp] getLast_cons theorem getLast_append_singleton {a : α} (l : List α) : getLast (l ++ [a]) (append_ne_nil_of_right_ne_nil l (cons_ne_nil a _)) = a := by simp [getLast_append] theorem getLast_append_of_right_ne_nil (l₁ l₂ : List α) (h : l₂ ≠ []) : getLast (l₁ ++ l₂) (append_ne_nil_of_right_ne_nil l₁ h) = getLast l₂ h := by induction l₁ with \| nil => simp \| cons _ _ ih => simp only [cons_append]; rw [List.getLast_cons]; exact ih @[deprecated (since := "2025-02-06")] alias getLast_append' := getLast_append_of_right_ne_nil theorem getLast_concat' {a : α} (l : List α) : getLast (concat l a) (by simp) = a := by simp @[simp] theorem getLast_singleton' (a : α) : getLast [a] (cons_ne_nil a []) = a := rfl @[simp] theorem getLast_cons_cons (a₁ a₂ : α) (l : List α) : getLast (a₁ :: a₂ :: l) (cons_ne_nil _ _) = getLast (a₂ :: l) (cons_ne_nil a₂ l) := rfl theorem dropLast_append_getLast : ∀ {l : List α} (h : l ≠ []), dropLast l ++ [getLast l h] = l \| [], h => absurd rfl h \| [_], _ => rfl \| a :: b :: l, h => by rw [dropLast_cons₂, cons_append, getLast_cons (cons_ne_nil _ _)] congr exact dropLast_append_getLast (cons_ne_nil b l) theorem getLast_congr {l₁ l₂ : List α} (h₁ : l₁ ≠ []) (h₂ : l₂ ≠ []) (h₃ : l₁ = l₂) : getLast l₁ h₁ = getLast l₂ h₂ := by subst l₁; rfl theorem getLast_replicate_succ (m : ℕ) (a : α) : (replicate (m + 1) a).getLast (ne_nil_of_length_eq_add_one length_replicate) = a := by simp only [replicate_succ'] exact getLast_append_singleton _ @[deprecated (since := "2025-02-07")] alias getLast_filter' := getLast_filter_of_pos /-! ### getLast? -/ theorem mem_getLast?_eq_getLast : ∀ {l : List α} {x : α}, x ∈ l.getLast? → ∃ h, x = getLast l h \| [], x, hx => False.elim <\| by simp at hx \| [a], x, hx => have : a = x := by simpa using hx this ▸ ⟨cons_ne_nil a [], rfl⟩ \| a :: b :: l, x, hx => by rw [getLast?_cons_cons] at hx rcases mem_getLast?_eq_getLast hx with ⟨_, h₂⟩ use cons_ne_nil _ _ assumption theorem getLast?_eq_getLast_of_ne_nil : ∀ {l : List α} (h : l ≠ []), l.getLast? = some (l.getLast h) \| [], h => (h rfl).elim \| [_], _ => rfl \| _ :: b :: l, _ => @getLast?_eq_getLast_of_ne_nil (b :: l) (cons_ne_nil _ _) theorem mem_getLast?_cons {x y : α} : ∀ {l : List α}, x ∈ l.getLast? → x ∈ (y :: l).getLast? \| [], _ => by contradiction \| _ :: _, h => h theorem dropLast_append_getLast? : ∀ {l : List α}, ∀ a ∈ l.getLast?, dropLast l ++ [a] = l \| [], a, ha => (Option.not_mem_none a ha).elim \| [a], _, rfl => rfl \| a :: b :: l, c, hc => by rw [getLast?_cons_cons] at hc rw [dropLast_cons₂, cons_append, dropLast_append_getLast? _ hc] theorem getLastI_eq_getLast? [Inhabited α] : ∀ l : List α, l.getLastI = l.getLast?.iget \| [] => by simp [getLastI, Inhabited.default] \| [_] => rfl \| [_, _] => rfl \| [_, _, _] => rfl \| _ :: _ :: c :: l => by simp [getLastI, getLastI_eq_getLast? (c :: l)] theorem getLast?_append_cons : ∀ (l₁ : List α) (a : α) (l₂ : List α), getLast? (l₁ ++ a :: l₂) = getLast? (a :: l₂) \| [], _, _ => rfl \| [_], _, _ => rfl \| b :: c :: l₁, a, l₂ => by rw [cons_append, cons_append, getLast?_cons_cons, ← cons_append, getLast?_append_cons (c :: l₁)] theorem getLast?_append_of_ne_nil (l₁ : List α) : ∀ {l₂ : List α} (_ : l₂ ≠ []), getLast? (l₁ ++ l₂) = getLast? l₂ \| [], hl₂ => by contradiction \| b :: l₂, _ => getLast?_append_cons l₁ b l₂ theorem mem_getLast?_append_of_mem_getLast? {l₁ l₂ : List α} {x : α} (h : x ∈ l₂.getLast?) : x ∈ (l₁ ++ l₂).getLast? := by cases l₂ · contradiction · rw [List.getLast?_append_cons] exact h /-! ### head(!?) and tail -/ @[simp] theorem head!_nil [Inhabited α] : ([] : List α).head! = default := rfl @[simp] theorem head_cons_tail (x : List α) (h : x ≠ []) : x.head h :: x.tail = x := by cases x <;> simp at h ⊢ theorem head_eq_getElem_zero {l : List α} (hl : l ≠ []) : l.head hl = l[0]'(length_pos_iff.2 hl) := (getElem_zero _).symm theorem head!_eq_head? [Inhabited α] (l : List α) : head! l = (head? l).iget := by cases l <;> rfl theorem surjective_head! [Inhabited α] : Surjective (@head! α _) := fun x => ⟨[x], rfl⟩ theorem surjective_head? : Surjective (@head? α) := Option.forall.2 ⟨⟨[], rfl⟩, fun x => ⟨[x], rfl⟩⟩ theorem surjective_tail : Surjective (@tail α) \| [] => ⟨[], rfl⟩ \| a :: l => ⟨a :: a :: l, rfl⟩ theorem eq_cons_of_mem_head? {x : α} : ∀ {l : List α}, x ∈ l.head? → l = x :: tail l \| [], h => (Option.not_mem_none _ h).elim \| a :: l, h => by simp only [head?, Option.mem_def, Option.some_inj] at h exact h ▸ rfl @[simp] theorem head!_cons [Inhabited α] (a : α) (l : List α) : head! (a :: l) = a := rfl @[simp] theorem head!_append [Inhabited α] (t : List α) {s : List α} (h : s ≠ []) : head! (s ++ t) = head! s := by induction s · contradiction · rfl theorem mem_head?_append_of_mem_head? {s t : List α} {x : α} (h : x ∈ s.head?) : x ∈ (s ++ t).head? := by cases s · contradiction · exact h theorem head?_append_of_ne_nil : ∀ (l₁ : List α) {l₂ : List α} (_ : l₁ ≠ []), head? (l₁ ++ l₂) = head? l₁ \| _ :: _, _, _ => rfl theorem tail_append_singleton_of_ne_nil {a : α} {l : List α} (h : l ≠ nil) : tail (l ++ [a]) = tail l ++ [a] := by induction l · contradiction · rw [tail, cons_append, tail] theorem cons_head?_tail : ∀ {l : List α} {a : α}, a ∈ head? l → a :: tail l = l \| [], a, h => by contradiction \| b :: l, a, h => by simp? at h says simp only [head?_cons, Option.mem_def, Option.some.injEq] at h simp [h] theorem head!_mem_head? [Inhabited α] : ∀ {l : List α}, l ≠ [] → head! l ∈ head? l \| [], h => by contradiction \| _ :: _, _ => rfl theorem cons_head!_tail [Inhabited α] {l : List α} (h : l ≠ []) : head! l :: tail l = l := cons_head?_tail (head!_mem_head? h) theorem head!_mem_self [Inhabited α] {l : List α} (h : l ≠ nil) : l.head! ∈ l := by have h' : l.head! ∈ l.head! :: l.tail := mem_cons_self rwa [cons_head!_tail h] at h' theorem get_eq_getElem? (l : List α) (i : Fin l.length) : l.get i = l[i]?.get (by simp [getElem?_eq_getElem]) := by simp @[deprecated (since := "2025-02-15")] alias get_eq_get? := get_eq_getElem? theorem exists_mem_iff_getElem {l : List α} {p : α → Prop} : (∃ x ∈ l, p x) ↔ ∃ (i : ℕ) (_ : i < l.length), p l[i] := by simp only [mem_iff_getElem] exact ⟨fun ⟨_x, ⟨i, hi, hix⟩, hxp⟩ ↦ ⟨i, hi, hix ▸ hxp⟩, fun ⟨i, hi, hp⟩ ↦ ⟨_, ⟨i, hi, rfl⟩, hp⟩⟩ theorem forall_mem_iff_getElem {l : List α} {p : α → Prop} : (∀ x ∈ l, p x) ↔ ∀ (i : ℕ) (_ : i < l.length), p l[i] := by simp [mem_iff_getElem, @forall_swap α] theorem get_tail (l : List α) (i) (h : i < l.tail.length) (h' : i + 1 < l.length := (by simp only [length_tail] at h; omega)) : l.tail.get ⟨i, h⟩ = l.get ⟨i + 1, h'⟩ := by cases l <;> [cases h; rfl] /-! ### sublists -/ attribute [refl] List.Sublist.refl theorem Sublist.cons_cons {l₁ l₂ : List α} (a : α) (s : l₁ <+ l₂) : a :: l₁ <+ a :: l₂ := Sublist.cons₂ _ s lemma cons_sublist_cons' {a b : α} : a :: l₁ <+ b :: l₂ ↔ a :: l₁ <+ l₂ ∨ a = b ∧ l₁ <+ l₂ := by constructor · rintro (_ \| _) · exact Or.inl ‹_› · exact Or.inr ⟨rfl, ‹_›⟩ · rintro (h \| ⟨rfl, h⟩) · exact h.cons _ · rwa [cons_sublist_cons] theorem sublist_cons_of_sublist (a : α) (h : l₁ <+ l₂) : l₁ <+ a :: l₂ := h.cons _ @[deprecated (since := "2025-02-07")] alias sublist_nil_iff_eq_nil := sublist_nil @[simp] lemma sublist_singleton {l : List α} {a : α} : l <+ [a] ↔ l = [] ∨ l = [a] := by constructor <;> rintro (_ \| _) <;> aesop theorem Sublist.antisymm (s₁ : l₁ <+ l₂) (s₂ : l₂ <+ l₁) : l₁ = l₂ := s₁.eq_of_length_le s₂.length_le /-- If the first element of two lists are different, then a sublist relation can be reduced. -/ theorem Sublist.of_cons_of_ne {a b} (h₁ : a ≠ b) (h₂ : a :: l₁ <+ b :: l₂) : a :: l₁ <+ l₂ := match h₁, h₂ with \| _, .cons _ h => h /-! ### indexOf -/ section IndexOf variable [DecidableEq α] theorem idxOf_cons_eq {a b : α} (l : List α) : b = a → idxOf a (b :: l) = 0 \| e => by rw [← e]; exact idxOf_cons_self @[deprecated (since := "2025-01-30")] alias indexOf_cons_eq := idxOf_cons_eq @[simp] theorem idxOf_cons_ne {a b : α} (l : List α) : b ≠ a → idxOf a (b :: l) = succ (idxOf a l) \| h => by simp only [idxOf_cons, Bool.cond_eq_ite, beq_iff_eq, if_neg h] @[deprecated (since := "2025-01-30")] alias indexOf_cons_ne := idxOf_cons_ne theorem idxOf_eq_length_iff {a : α} {l : List α} : idxOf a l = length l ↔ a ∉ l := by induction l with \| nil => exact iff_of_true rfl not_mem_nil \| cons b l ih => simp only [length, mem_cons, idxOf_cons, eq_comm] rw [cond_eq_if] split_ifs with h <;> simp at h · exact iff_of_false (by rintro ⟨⟩) fun H => H <\| Or.inl h.symm · simp only [Ne.symm h, false_or] rw [← ih] exact succ_inj @[simp] theorem idxOf_of_not_mem {l : List α} {a : α} : a ∉ l → idxOf a l = length l := idxOf_eq_length_iff.2 @[deprecated (since := "2025-01-30")] alias indexOf_of_not_mem := idxOf_of_not_mem theorem idxOf_le_length {a : α} {l : List α} : idxOf a l ≤ length l := by induction l with \| nil => rfl \| cons b l ih => ?_ simp only [length, idxOf_cons, cond_eq_if, beq_iff_eq] by_cases h : b = a · rw [if_pos h]; exact Nat.zero_le _ · rw [if_neg h]; exact succ_le_succ ih @[deprecated (since := "2025-01-30")] alias indexOf_le_length := idxOf_le_length theorem idxOf_lt_length_iff {a} {l : List α} : idxOf a l < length l ↔ a ∈ l := ⟨fun h => Decidable.byContradiction fun al => Nat.ne_of_lt h <\| idxOf_eq_length_iff.2 al, fun al => (lt_of_le_of_ne idxOf_le_length) fun h => idxOf_eq_length_iff.1 h al⟩ @[deprecated (since := "2025-01-30")] alias indexOf_lt_length_iff := idxOf_lt_length_iff theorem idxOf_append_of_mem {a : α} (h : a ∈ l₁) : idxOf a (l₁ ++ l₂) = idxOf a l₁ := by induction l₁ with \| nil => exfalso exact not_mem_nil h \| cons d₁ t₁ ih => rw [List.cons_append] by_cases hh : d₁ = a · iterate 2 rw [idxOf_cons_eq _ hh] rw [idxOf_cons_ne _ hh, idxOf_cons_ne _ hh, ih (mem_of_ne_of_mem (Ne.symm hh) h)] @[deprecated (since := "2025-01-30")] alias indexOf_append_of_mem := idxOf_append_of_mem theorem idxOf_append_of_not_mem {a : α} (h : a ∉ l₁) : idxOf a (l₁ ++ l₂) = l₁.length + idxOf a l₂ := by induction l₁ with	\| nil => rw [List.nil_append, List.length, Nat.zero_add]	Mathlib/Data/List/Basic.lean	585	585
/- Copyright (c) 2020 Kenny Lau. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kenny Lau, Ken Lee, Chris Hughes -/ import Mathlib.Algebra.Group.Action.Units import Mathlib.Algebra.Group.Nat.Units import Mathlib.Algebra.GroupWithZero.Divisibility import Mathlib.Algebra.Ring.Divisibility.Basic import Mathlib.Algebra.Ring.Hom.Defs import Mathlib.Logic.Basic import Mathlib.Tactic.Ring /-! # Coprime elements of a ring or monoid ## Main definition * `IsCoprime x y`: that `x` and `y` are coprime, defined to be the existence of `a` and `b` such that `a * x + b * y = 1`. Note that elements with no common divisors (`IsRelPrime`) are not necessarily coprime, e.g., the multivariate polynomials `x₁` and `x₂` are not coprime. The two notions are equivalent in Bézout rings, see `isRelPrime_iff_isCoprime`. This file also contains lemmas about `IsRelPrime` parallel to `IsCoprime`. See also `RingTheory.Coprime.Lemmas` for further development of coprime elements. -/ universe u v section CommSemiring variable {R : Type u} [CommSemiring R] (x y z : R) /-- The proposition that `x` and `y` are coprime, defined to be the existence of `a` and `b` such that `a * x + b * y = 1`. Note that elements with no common divisors are not necessarily coprime, e.g., the multivariate polynomials `x₁` and `x₂` are not coprime. -/ def IsCoprime : Prop := ∃ a b, a * x + b * y = 1 variable {x y z} @[symm] theorem IsCoprime.symm (H : IsCoprime x y) : IsCoprime y x := let ⟨a, b, H⟩ := H ⟨b, a, by rw [add_comm, H]⟩ theorem isCoprime_comm : IsCoprime x y ↔ IsCoprime y x := ⟨IsCoprime.symm, IsCoprime.symm⟩ theorem isCoprime_self : IsCoprime x x ↔ IsUnit x := ⟨fun ⟨a, b, h⟩ => isUnit_of_mul_eq_one x (a + b) <\| by rwa [mul_comm, add_mul], fun h => let ⟨b, hb⟩ := isUnit_iff_exists_inv'.1 h ⟨b, 0, by rwa [zero_mul, add_zero]⟩⟩ theorem isCoprime_zero_left : IsCoprime 0 x ↔ IsUnit x := ⟨fun ⟨a, b, H⟩ => isUnit_of_mul_eq_one x b <\| by rwa [mul_zero, zero_add, mul_comm] at H, fun H => let ⟨b, hb⟩ := isUnit_iff_exists_inv'.1 H ⟨1, b, by rwa [one_mul, zero_add]⟩⟩ theorem isCoprime_zero_right : IsCoprime x 0 ↔ IsUnit x := isCoprime_comm.trans isCoprime_zero_left theorem not_isCoprime_zero_zero [Nontrivial R] : ¬IsCoprime (0 : R) 0 := mt isCoprime_zero_right.mp not_isUnit_zero lemma IsCoprime.intCast {R : Type*} [CommRing R] {a b : ℤ} (h : IsCoprime a b) : IsCoprime (a : R) (b : R) := by rcases h with ⟨u, v, H⟩ use u, v rw_mod_cast [H] exact Int.cast_one /-- If a 2-vector `p` satisfies `IsCoprime (p 0) (p 1)`, then `p ≠ 0`. -/	theorem IsCoprime.ne_zero [Nontrivial R] {p : Fin 2 → R} (h : IsCoprime (p 0) (p 1)) : p ≠ 0 := by rintro rfl exact not_isCoprime_zero_zero h theorem IsCoprime.ne_zero_or_ne_zero [Nontrivial R] (h : IsCoprime x y) : x ≠ 0 ∨ y ≠ 0 := by apply not_or_of_imp	Mathlib/RingTheory/Coprime/Basic.lean	76	81
/- Copyright (c) 2021 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel, Yaël Dillies -/ import Mathlib.Analysis.Normed.Group.Pointwise import Mathlib.Analysis.NormedSpace.Real /-! # Properties of pointwise scalar multiplication of sets in normed spaces. We explore the relationships between scalar multiplication of sets in vector spaces, and the norm. Notably, we express arbitrary balls as rescaling of other balls, and we show that the multiplication of bounded sets remain bounded. -/ open Metric Set open Pointwise Topology variable {𝕜 E : Type} section SMulZeroClass variable [SeminormedAddCommGroup 𝕜] [SeminormedAddCommGroup E] variable [SMulZeroClass 𝕜 E] [IsBoundedSMul 𝕜 E] theorem ediam_smul_le (c : 𝕜) (s : Set E) : EMetric.diam (c • s) ≤ ‖c‖₊ • EMetric.diam s := (lipschitzWith_smul c).ediam_image_le s end SMulZeroClass section DivisionRing variable [NormedDivisionRing 𝕜] [SeminormedAddCommGroup E] variable [Module 𝕜 E] [IsBoundedSMul 𝕜 E] theorem ediam_smul₀ (c : 𝕜) (s : Set E) : EMetric.diam (c • s) = ‖c‖₊ • EMetric.diam s := by refine le_antisymm (ediam_smul_le c s) ?_ obtain rfl \| hc := eq_or_ne c 0 · obtain rfl \| hs := s.eq_empty_or_nonempty · simp simp [zero_smul_set hs, ← Set.singleton_zero] · have := (lipschitzWith_smul c⁻¹).ediam_image_le (c • s) rwa [← smul_eq_mul, ← ENNReal.smul_def, Set.image_smul, inv_smul_smul₀ hc s, nnnorm_inv, le_inv_smul_iff_of_pos (nnnorm_pos.2 hc)] at this theorem diam_smul₀ (c : 𝕜) (x : Set E) : diam (c • x) = ‖c‖ diam x := by simp_rw [diam, ediam_smul₀, ENNReal.toReal_smul, NNReal.smul_def, coe_nnnorm, smul_eq_mul] theorem infEdist_smul₀ {c : 𝕜} (hc : c ≠ 0) (s : Set E) (x : E) : EMetric.infEdist (c • x) (c • s) = ‖c‖₊ • EMetric.infEdist x s := by simp_rw [EMetric.infEdist] have : Function.Surjective ((c • ·) : E → E) := Function.RightInverse.surjective (smul_inv_smul₀ hc) trans ⨅ (y) (_ : y ∈ s), ‖c‖₊ • edist x y · refine (this.iInf_congr _ fun y => ?_).symm simp_rw [smul_mem_smul_set_iff₀ hc, edist_smul₀] · have : (‖c‖₊ : ENNReal) ≠ 0 := by simp [hc] simp_rw [ENNReal.smul_def, smul_eq_mul, ENNReal.mul_iInf_of_ne this ENNReal.coe_ne_top] theorem infDist_smul₀ {c : 𝕜} (hc : c ≠ 0) (s : Set E) (x : E) : Metric.infDist (c • x) (c • s) = ‖c‖ * Metric.infDist x s := by simp_rw [Metric.infDist, infEdist_smul₀ hc s, ENNReal.toReal_smul, NNReal.smul_def, coe_nnnorm, smul_eq_mul] end DivisionRing variable [NormedField 𝕜] section SeminormedAddCommGroup variable [SeminormedAddCommGroup E] [NormedSpace 𝕜 E] theorem smul_ball {c : 𝕜} (hc : c ≠ 0) (x : E) (r : ℝ) : c • ball x r = ball (c • x) (‖c‖ * r) := by ext y rw [mem_smul_set_iff_inv_smul_mem₀ hc] conv_lhs => rw [← inv_smul_smul₀ hc x] simp [← div_eq_inv_mul, div_lt_iff₀ (norm_pos_iff.2 hc), mul_comm _ r, dist_smul₀] theorem smul_unitBall {c : 𝕜} (hc : c ≠ 0) : c • ball (0 : E) (1 : ℝ) = ball (0 : E) ‖c‖ := by rw [_root_.smul_ball hc, smul_zero, mul_one] theorem smul_sphere' {c : 𝕜} (hc : c ≠ 0) (x : E) (r : ℝ) : c • sphere x r = sphere (c • x) (‖c‖ * r) := by ext y rw [mem_smul_set_iff_inv_smul_mem₀ hc] conv_lhs => rw [← inv_smul_smul₀ hc x] simp only [mem_sphere, dist_smul₀, norm_inv, ← div_eq_inv_mul, div_eq_iff (norm_pos_iff.2 hc).ne', mul_comm r] theorem smul_closedBall' {c : 𝕜} (hc : c ≠ 0) (x : E) (r : ℝ) : c • closedBall x r = closedBall (c • x) (‖c‖ * r) := by simp only [← ball_union_sphere, Set.smul_set_union, _root_.smul_ball hc, smul_sphere' hc] theorem set_smul_sphere_zero {s : Set 𝕜} (hs : 0 ∉ s) (r : ℝ) : s • sphere (0 : E) r = (‖·‖) ⁻¹' ((‖·‖ * r) '' s) := calc s • sphere (0 : E) r = ⋃ c ∈ s, c • sphere (0 : E) r := iUnion_smul_left_image.symm _ = ⋃ c ∈ s, sphere (0 : E) (‖c‖ * r) := iUnion₂_congr fun c hc ↦ by rw [smul_sphere' (ne_of_mem_of_not_mem hc hs), smul_zero] _ = (‖·‖) ⁻¹' ((‖·‖ * r) '' s) := by ext; simp [eq_comm] /-- Image of a bounded set in a normed space under scalar multiplication by a constant is bounded. See also `Bornology.IsBounded.smul` for a similar lemma about an isometric action. -/ theorem Bornology.IsBounded.smul₀ {s : Set E} (hs : IsBounded s) (c : 𝕜) : IsBounded (c • s) := (lipschitzWith_smul c).isBounded_image hs /-- If `s` is a bounded set, then for small enough `r`, the set `{x} + r • s` is contained in any fixed neighborhood of `x`. -/ theorem eventually_singleton_add_smul_subset {x : E} {s : Set E} (hs : Bornology.IsBounded s) {u : Set E} (hu : u ∈ 𝓝 x) : ∀ᶠ r in 𝓝 (0 : 𝕜), {x} + r • s ⊆ u := by obtain ⟨ε, εpos, hε⟩ : ∃ ε : ℝ, 0 < ε ∧ closedBall x ε ⊆ u := nhds_basis_closedBall.mem_iff.1 hu obtain ⟨R, Rpos, hR⟩ : ∃ R : ℝ, 0 < R ∧ s ⊆ closedBall 0 R := hs.subset_closedBall_lt 0 0 have : Metric.closedBall (0 : 𝕜) (ε / R) ∈ 𝓝 (0 : 𝕜) := closedBall_mem_nhds _ (div_pos εpos Rpos) filter_upwards [this] with r hr simp only [image_add_left, singleton_add] intro y hy obtain ⟨z, zs, hz⟩ : ∃ z : E, z ∈ s ∧ r • z = -x + y := by simpa [mem_smul_set] using hy have I : ‖r • z‖ ≤ ε := calc ‖r • z‖ = ‖r‖ * ‖z‖ := norm_smul _ _ _ ≤ ε / R * R := (mul_le_mul (mem_closedBall_zero_iff.1 hr) (mem_closedBall_zero_iff.1 (hR zs)) (norm_nonneg _) (div_pos εpos Rpos).le) _ = ε := by field_simp have : y = x + r • z := by simp only [hz, add_neg_cancel_left] apply hε simpa only [this, dist_eq_norm, add_sub_cancel_left, mem_closedBall] using I variable [NormedSpace ℝ E] {x y z : E} {δ ε : ℝ} /-- In a real normed space, the image of the unit ball under scalar multiplication by a positive constant `r` is the ball of radius `r`. -/ theorem smul_unitBall_of_pos {r : ℝ} (hr : 0 < r) : r • ball (0 : E) 1 = ball (0 : E) r := by rw [smul_unitBall hr.ne', Real.norm_of_nonneg hr.le] lemma Ioo_smul_sphere_zero {a b r : ℝ} (ha : 0 ≤ a) (hr : 0 < r) : Ioo a b • sphere (0 : E) r = ball 0 (b * r) \ closedBall 0 (a * r) := by have : EqOn (‖·‖) id (Ioo a b) := fun x hx ↦ abs_of_pos (ha.trans_lt hx.1) rw [set_smul_sphere_zero (by simp [ha.not_lt]), ← image_image (· * r), this.image_eq, image_id, image_mul_right_Ioo _ _ hr] ext x; simp [and_comm] -- This is also true for `ℚ`-normed spaces theorem exists_dist_eq (x z : E) {a b : ℝ} (ha : 0 ≤ a) (hb : 0 ≤ b) (hab : a + b = 1) : ∃ y, dist x y = b * dist x z ∧ dist y z = a * dist x z := by use a • x + b • z nth_rw 1 [← one_smul ℝ x] nth_rw 4 [← one_smul ℝ z] simp [dist_eq_norm, ← hab, add_smul, ← smul_sub, norm_smul_of_nonneg, ha, hb] theorem exists_dist_le_le (hδ : 0 ≤ δ) (hε : 0 ≤ ε) (h : dist x z ≤ ε + δ) : ∃ y, dist x y ≤ δ ∧ dist y z ≤ ε := by obtain rfl \| hε' := hε.eq_or_lt · exact ⟨z, by rwa [zero_add] at h, (dist_self _).le⟩ have hεδ := add_pos_of_pos_of_nonneg hε' hδ refine (exists_dist_eq x z (div_nonneg hε <\| add_nonneg hε hδ) (div_nonneg hδ <\| add_nonneg hε hδ) <\| by rw [← add_div, div_self hεδ.ne']).imp fun y hy => ?_ rw [hy.1, hy.2, div_mul_comm, div_mul_comm ε] rw [← div_le_one hεδ] at h exact ⟨mul_le_of_le_one_left hδ h, mul_le_of_le_one_left hε h⟩ -- This is also true for `ℚ`-normed spaces theorem exists_dist_le_lt (hδ : 0 ≤ δ) (hε : 0 < ε) (h : dist x z < ε + δ) : ∃ y, dist x y ≤ δ ∧ dist y z < ε := by refine (exists_dist_eq x z (div_nonneg hε.le <\| add_nonneg hε.le hδ) (div_nonneg hδ <\| add_nonneg hε.le hδ) <\| by rw [← add_div, div_self (add_pos_of_pos_of_nonneg hε hδ).ne']).imp fun y hy => ?_ rw [hy.1, hy.2, div_mul_comm, div_mul_comm ε] rw [← div_lt_one (add_pos_of_pos_of_nonneg hε hδ)] at h exact ⟨mul_le_of_le_one_left hδ h.le, mul_lt_of_lt_one_left hε h⟩ -- This is also true for `ℚ`-normed spaces theorem exists_dist_lt_le (hδ : 0 < δ) (hε : 0 ≤ ε) (h : dist x z < ε + δ) : ∃ y, dist x y < δ ∧ dist y z ≤ ε := by obtain ⟨y, yz, xy⟩ := exists_dist_le_lt hε hδ (show dist z x < δ + ε by simpa only [dist_comm, add_comm] using h) exact ⟨y, by simp [dist_comm x y, dist_comm y z, *]⟩ -- This is also true for `ℚ`-normed spaces theorem exists_dist_lt_lt (hδ : 0 < δ) (hε : 0 < ε) (h : dist x z < ε + δ) : ∃ y, dist x y < δ ∧ dist y z < ε := by refine (exists_dist_eq x z (div_nonneg hε.le <\| add_nonneg hε.le hδ.le) (div_nonneg hδ.le <\| add_nonneg hε.le hδ.le) <\| by rw [← add_div, div_self (add_pos hε hδ).ne']).imp fun y hy => ?_ rw [hy.1, hy.2, div_mul_comm, div_mul_comm ε] rw [← div_lt_one (add_pos hε hδ)] at h exact ⟨mul_lt_of_lt_one_left hδ h, mul_lt_of_lt_one_left hε h⟩ -- This is also true for `ℚ`-normed spaces theorem disjoint_ball_ball_iff (hδ : 0 < δ) (hε : 0 < ε) : Disjoint (ball x δ) (ball y ε) ↔ δ + ε ≤ dist x y := by refine ⟨fun h => le_of_not_lt fun hxy => ?_, ball_disjoint_ball⟩ rw [add_comm] at hxy obtain ⟨z, hxz, hzy⟩ := exists_dist_lt_lt hδ hε hxy rw [dist_comm] at hxz exact h.le_bot ⟨hxz, hzy⟩ -- This is also true for `ℚ`-normed spaces theorem disjoint_ball_closedBall_iff (hδ : 0 < δ) (hε : 0 ≤ ε) : Disjoint (ball x δ) (closedBall y ε) ↔ δ + ε ≤ dist x y := by refine ⟨fun h => le_of_not_lt fun hxy => ?_, ball_disjoint_closedBall⟩ rw [add_comm] at hxy obtain ⟨z, hxz, hzy⟩ := exists_dist_lt_le hδ hε hxy rw [dist_comm] at hxz exact h.le_bot ⟨hxz, hzy⟩ -- This is also true for `ℚ`-normed spaces theorem disjoint_closedBall_ball_iff (hδ : 0 ≤ δ) (hε : 0 < ε) : Disjoint (closedBall x δ) (ball y ε) ↔ δ + ε ≤ dist x y := by rw [disjoint_comm, disjoint_ball_closedBall_iff hε hδ, add_comm, dist_comm] theorem disjoint_closedBall_closedBall_iff (hδ : 0 ≤ δ) (hε : 0 ≤ ε) : Disjoint (closedBall x δ) (closedBall y ε) ↔ δ + ε < dist x y := by refine ⟨fun h => lt_of_not_ge fun hxy => ?_, closedBall_disjoint_closedBall⟩ rw [add_comm] at hxy obtain ⟨z, hxz, hzy⟩ := exists_dist_le_le hδ hε hxy rw [dist_comm] at hxz exact h.le_bot ⟨hxz, hzy⟩ open EMetric ENNReal @[simp] theorem infEdist_thickening (hδ : 0 < δ) (s : Set E) (x : E) : infEdist x (thickening δ s) = infEdist x s - ENNReal.ofReal δ := by obtain hs \| hs := lt_or_le (infEdist x s) (ENNReal.ofReal δ) · rw [infEdist_zero_of_mem, tsub_eq_zero_of_le hs.le] exact hs refine (tsub_le_iff_right.2 infEdist_le_infEdist_thickening_add).antisymm' ?_ refine le_sub_of_add_le_right ofReal_ne_top ?_ refine le_infEdist.2 fun z hz => le_of_forall_lt' fun r h => ?_ cases r with \| top => exact add_lt_top.2 ⟨lt_top_iff_ne_top.2 <\| infEdist_ne_top ⟨z, self_subset_thickening hδ _ hz⟩, ofReal_lt_top⟩ \| coe r => have hr : 0 < ↑r - δ := by refine sub_pos_of_lt ?_ have := hs.trans_lt ((infEdist_le_edist_of_mem hz).trans_lt h) rw [ofReal_eq_coe_nnreal hδ.le] at this exact mod_cast this rw [edist_lt_coe, ← dist_lt_coe, ← add_sub_cancel δ ↑r] at h obtain ⟨y, hxy, hyz⟩ := exists_dist_lt_lt hr hδ h refine (ENNReal.add_lt_add_right ofReal_ne_top <\| infEdist_lt_iff.2 ⟨_, mem_thickening_iff.2 ⟨_, hz, hyz⟩, edist_lt_ofReal.2 hxy⟩).trans_le ?_ rw [← ofReal_add hr.le hδ.le, sub_add_cancel, ofReal_coe_nnreal] @[simp] theorem thickening_thickening (hε : 0 < ε) (hδ : 0 < δ) (s : Set E) : thickening ε (thickening δ s) = thickening (ε + δ) s := (thickening_thickening_subset _ _ _).antisymm fun x => by simp_rw [mem_thickening_iff] rintro ⟨z, hz, hxz⟩ rw [add_comm] at hxz obtain ⟨y, hxy, hyz⟩ := exists_dist_lt_lt hε hδ hxz exact ⟨y, ⟨_, hz, hyz⟩, hxy⟩ @[simp] theorem cthickening_thickening (hε : 0 ≤ ε) (hδ : 0 < δ) (s : Set E) : cthickening ε (thickening δ s) = cthickening (ε + δ) s := (cthickening_thickening_subset hε _ _).antisymm fun x => by simp_rw [mem_cthickening_iff, ENNReal.ofReal_add hε hδ.le, infEdist_thickening hδ] exact tsub_le_iff_right.2 -- Note: `interior (cthickening δ s) ≠ thickening δ s` in general @[simp] theorem closure_thickening (hδ : 0 < δ) (s : Set E) : closure (thickening δ s) = cthickening δ s := by rw [← cthickening_zero, cthickening_thickening le_rfl hδ, zero_add] @[simp] theorem infEdist_cthickening (δ : ℝ) (s : Set E) (x : E) : infEdist x (cthickening δ s) = infEdist x s - ENNReal.ofReal δ := by obtain hδ \| hδ := le_or_lt δ 0 · rw [cthickening_of_nonpos hδ, infEdist_closure, ofReal_of_nonpos hδ, tsub_zero] · rw [← closure_thickening hδ, infEdist_closure, infEdist_thickening hδ] @[simp] theorem thickening_cthickening (hε : 0 < ε) (hδ : 0 ≤ δ) (s : Set E) : thickening ε (cthickening δ s) = thickening (ε + δ) s := by obtain rfl \| hδ := hδ.eq_or_lt · rw [cthickening_zero, thickening_closure, add_zero] · rw [← closure_thickening hδ, thickening_closure, thickening_thickening hε hδ] @[simp] theorem cthickening_cthickening (hε : 0 ≤ ε) (hδ : 0 ≤ δ) (s : Set E) : cthickening ε (cthickening δ s) = cthickening (ε + δ) s := (cthickening_cthickening_subset hε hδ _).antisymm fun x => by simp_rw [mem_cthickening_iff, ENNReal.ofReal_add hε hδ, infEdist_cthickening] exact tsub_le_iff_right.2 @[simp] theorem thickening_ball (hε : 0 < ε) (hδ : 0 < δ) (x : E) : thickening ε (ball x δ) = ball x (ε + δ) := by rw [← thickening_singleton, thickening_thickening hε hδ, thickening_singleton] @[simp] theorem thickening_closedBall (hε : 0 < ε) (hδ : 0 ≤ δ) (x : E) : thickening ε (closedBall x δ) = ball x (ε + δ) := by rw [← cthickening_singleton _ hδ, thickening_cthickening hε hδ, thickening_singleton] @[simp] theorem cthickening_ball (hε : 0 ≤ ε) (hδ : 0 < δ) (x : E) : cthickening ε (ball x δ) = closedBall x (ε + δ) := by	rw [← thickening_singleton, cthickening_thickening hε hδ, cthickening_singleton _ (add_nonneg hε hδ.le)] @[simp] theorem cthickening_closedBall (hε : 0 ≤ ε) (hδ : 0 ≤ δ) (x : E) :	Mathlib/Analysis/NormedSpace/Pointwise.lean	312	316
/- 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.Analysis.Convex.Hull /-! # Convex join This file defines the convex join of two sets. The convex join of `s` and `t` is the union of the segments with one end in `s` and the other in `t`. This is notably a useful gadget to deal with convex hulls of finite sets. -/ open Set variable {ι : Sort} {𝕜 E : Type} section OrderedSemiring variable (𝕜) [Semiring 𝕜] [PartialOrder 𝕜] [AddCommMonoid E] [Module 𝕜 E] {s t s₁ s₂ t₁ t₂ u : Set E} {x y : E} /-- The join of two sets is the union of the segments joining them. This can be interpreted as the topological join, but within the original space. -/ def convexJoin (s t : Set E) : Set E := ⋃ (x ∈ s) (y ∈ t), segment 𝕜 x y variable {𝕜} theorem mem_convexJoin : x ∈ convexJoin 𝕜 s t ↔ ∃ a ∈ s, ∃ b ∈ t, x ∈ segment 𝕜 a b := by simp [convexJoin] theorem convexJoin_comm (s t : Set E) : convexJoin 𝕜 s t = convexJoin 𝕜 t s := (iUnion₂_comm _).trans <\| by simp_rw [convexJoin, segment_symm] theorem convexJoin_mono (hs : s₁ ⊆ s₂) (ht : t₁ ⊆ t₂) : convexJoin 𝕜 s₁ t₁ ⊆ convexJoin 𝕜 s₂ t₂ := biUnion_mono hs fun _ _ => biUnion_subset_biUnion_left ht theorem convexJoin_mono_left (hs : s₁ ⊆ s₂) : convexJoin 𝕜 s₁ t ⊆ convexJoin 𝕜 s₂ t := convexJoin_mono hs Subset.rfl theorem convexJoin_mono_right (ht : t₁ ⊆ t₂) : convexJoin 𝕜 s t₁ ⊆ convexJoin 𝕜 s t₂ := convexJoin_mono Subset.rfl ht @[simp] theorem convexJoin_empty_left (t : Set E) : convexJoin 𝕜 ∅ t = ∅ := by simp [convexJoin] @[simp] theorem convexJoin_empty_right (s : Set E) : convexJoin 𝕜 s ∅ = ∅ := by simp [convexJoin] @[simp] theorem convexJoin_singleton_left (t : Set E) (x : E) : convexJoin 𝕜 {x} t = ⋃ y ∈ t, segment 𝕜 x y := by simp [convexJoin] @[simp] theorem convexJoin_singleton_right (s : Set E) (y : E) : convexJoin 𝕜 s {y} = ⋃ x ∈ s, segment 𝕜 x y := by simp [convexJoin] theorem convexJoin_singletons (x : E) : convexJoin 𝕜 {x} {y} = segment 𝕜 x y := by simp @[simp] theorem convexJoin_union_left (s₁ s₂ t : Set E) : convexJoin 𝕜 (s₁ ∪ s₂) t = convexJoin 𝕜 s₁ t ∪ convexJoin 𝕜 s₂ t := by simp_rw [convexJoin, mem_union, iUnion_or, iUnion_union_distrib] @[simp] theorem convexJoin_union_right (s t₁ t₂ : Set E) : convexJoin 𝕜 s (t₁ ∪ t₂) = convexJoin 𝕜 s t₁ ∪ convexJoin 𝕜 s t₂ := by simp_rw [convexJoin_comm s, convexJoin_union_left] @[simp] theorem convexJoin_iUnion_left (s : ι → Set E) (t : Set E) : convexJoin 𝕜 (⋃ i, s i) t = ⋃ i, convexJoin 𝕜 (s i) t := by simp_rw [convexJoin, mem_iUnion, iUnion_exists] exact iUnion_comm _ @[simp] theorem convexJoin_iUnion_right (s : Set E) (t : ι → Set E) : convexJoin 𝕜 s (⋃ i, t i) = ⋃ i, convexJoin 𝕜 s (t i) := by simp_rw [convexJoin_comm s, convexJoin_iUnion_left] theorem segment_subset_convexJoin (hx : x ∈ s) (hy : y ∈ t) : segment 𝕜 x y ⊆ convexJoin 𝕜 s t := subset_iUnion₂_of_subset x hx <\| subset_iUnion₂ (s := fun y _ ↦ segment 𝕜 x y) y hy section variable [IsOrderedRing 𝕜]	theorem subset_convexJoin_left (h : t.Nonempty) : s ⊆ convexJoin 𝕜 s t := fun _x hx => let ⟨_y, hy⟩ := h segment_subset_convexJoin hx hy <\| left_mem_segment _ _ _	Mathlib/Analysis/Convex/Join.lean	91	94
/- 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.Algebra.Bilinear import Mathlib.Algebra.Algebra.Opposite import Mathlib.Algebra.Group.Pointwise.Finset.Basic import Mathlib.Algebra.Group.Pointwise.Set.BigOperators import Mathlib.Algebra.Module.Submodule.Pointwise import Mathlib.Algebra.Ring.NonZeroDivisors import Mathlib.Algebra.Ring.Submonoid.Pointwise import Mathlib.Data.Set.Semiring import Mathlib.GroupTheory.GroupAction.SubMulAction.Pointwise /-! # Multiplication and division of submodules of an algebra. An interface for multiplication and division of sub-R-modules of an R-algebra A is developed. ## Main definitions Let `R` be a commutative ring (or semiring) and let `A` be an `R`-algebra. * `1 : Submodule R A` : the R-submodule R of the R-algebra A * `Mul (Submodule R A)` : multiplication of two sub-R-modules M and N of A is defined to be the smallest submodule containing all the products `m * n`. * `Div (Submodule R A)` : `I / J` is defined to be the submodule consisting of all `a : A` such that `a • J ⊆ I` It is proved that `Submodule R A` is a semiring, and also an algebra over `Set A`. Additionally, in the `Pointwise` locale we promote `Submodule.pointwiseDistribMulAction` to a `MulSemiringAction` as `Submodule.pointwiseMulSemiringAction`. When `R` is not necessarily commutative, and `A` is merely a `R`-module with a ring structure such that `IsScalarTower R A A` holds (equivalent to the data of a ring homomorphism `R →+* A` by `ringHomEquivModuleIsScalarTower`), we can still define `1 : Submodule R A` and `Mul (Submodule R A)`, but `1` is only a left identity, not necessarily a right one. ## Tags multiplication of submodules, division of submodules, submodule semiring -/ universe uι u v open Algebra Set MulOpposite open Pointwise namespace SubMulAction variable {R : Type u} {A : Type v} [CommSemiring R] [Semiring A] [Algebra R A] theorem algebraMap_mem (r : R) : algebraMap R A r ∈ (1 : SubMulAction R A) := ⟨r, (algebraMap_eq_smul_one r).symm⟩ theorem mem_one' {x : A} : x ∈ (1 : SubMulAction R A) ↔ ∃ y, algebraMap R A y = x := exists_congr fun r => by rw [algebraMap_eq_smul_one] end SubMulAction namespace Submodule section Module variable {R : Type u} [Semiring R] {A : Type v} [Semiring A] [Module R A] -- TODO: Why is this in a file about `Algebra`? -- TODO: potentially change this back to `LinearMap.range (Algebra.linearMap R A)` -- once a version of `Algebra` without the `commutes'` field is introduced. -- See issue https://github.com/leanprover-community/mathlib4/issues/18110. /-- `1 : Submodule R A` is the submodule `R ∙ 1` of `A`. -/ instance one : One (Submodule R A) := ⟨LinearMap.range (LinearMap.toSpanSingleton R A 1)⟩ theorem one_eq_span : (1 : Submodule R A) = R ∙ 1 := (LinearMap.span_singleton_eq_range _ _ _).symm theorem le_one_toAddSubmonoid : 1 ≤ (1 : Submodule R A).toAddSubmonoid := by rintro x ⟨n, rfl⟩ exact ⟨n, show (n : R) • (1 : A) = n by rw [Nat.cast_smul_eq_nsmul, nsmul_one]⟩ @[simp] theorem toSubMulAction_one : (1 : Submodule R A).toSubMulAction = 1 := SetLike.ext fun _ ↦ by rw [one_eq_span, SubMulAction.mem_one]; exact mem_span_singleton theorem one_eq_span_one_set : (1 : Submodule R A) = span R 1 := one_eq_span @[simp] theorem one_le {P : Submodule R A} : (1 : Submodule R A) ≤ P ↔ (1 : A) ∈ P := by simp [one_eq_span] variable {M : Type*} [AddCommMonoid M] [Module R M] [Module A M] [IsScalarTower R A M] instance : SMul (Submodule R A) (Submodule R M) where smul A' M' := { __ := A'.toAddSubmonoid • M'.toAddSubmonoid smul_mem' := fun r m hm ↦ AddSubmonoid.smul_induction_on hm (fun a ha m hm ↦ by rw [← smul_assoc]; exact AddSubmonoid.smul_mem_smul (A'.smul_mem r ha) hm) fun m₁ m₂ h₁ h₂ ↦ by rw [smul_add]; exact (A'.1 • M'.1).add_mem h₁ h₂ } section variable {I J : Submodule R A} {N P : Submodule R M} theorem smul_toAddSubmonoid : (I • N).toAddSubmonoid = I.toAddSubmonoid • N.toAddSubmonoid := rfl theorem smul_mem_smul {r} {n} (hr : r ∈ I) (hn : n ∈ N) : r • n ∈ I • N := AddSubmonoid.smul_mem_smul hr hn theorem smul_le : I • N ≤ P ↔ ∀ r ∈ I, ∀ n ∈ N, r • n ∈ P := AddSubmonoid.smul_le @[simp, norm_cast] lemma coe_set_smul : (I : Set A) • N = I • N :=	set_smul_eq_of_le _ _ _ (fun _ _ hr hx ↦ smul_mem_smul hr hx) (smul_le.mpr fun _ hr _ hx ↦ mem_set_smul_of_mem_mem hr hx)	Mathlib/Algebra/Algebra/Operations.lean	121	124
/- 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 -/ import Mathlib.Algebra.Order.Antidiag.Finsupp import Mathlib.Data.Finsupp.Weight import Mathlib.Tactic.Linarith import Mathlib.LinearAlgebra.Pi import Mathlib.Algebra.MvPolynomial.Eval /-! # Formal (multivariate) power series This file defines multivariate formal power series and develops the basic properties of these objects. A formal power series is to a polynomial like an infinite sum is to a finite sum. We provide the natural inclusion from multivariate polynomials to multivariate formal power series. ## Main definitions - `MvPowerSeries.C`: constant power series - `MvPowerSeries.X`: the indeterminates - `MvPowerSeries.coeff`, `MvPowerSeries.constantCoeff`: the coefficients of a `MvPowerSeries`, its constant coefficient - `MvPowerSeries.monomial`: the monomials - `MvPowerSeries.coeff_mul`: computes the coefficients of the product of two `MvPowerSeries` - `MvPowerSeries.coeff_prod` : computes the coefficients of products of `MvPowerSeries` - `MvPowerSeries.coeff_pow` : computes the coefficients of powers of a `MvPowerSeries` - `MvPowerSeries.coeff_eq_zero_of_constantCoeff_nilpotent`: if the constant coefficient of a `MvPowerSeries` is nilpotent, then some coefficients of its powers are automatically zero - `MvPowerSeries.map`: apply a `RingHom` to the coefficients of a `MvPowerSeries` (as a `RingHom) - `MvPowerSeries.X_pow_dvd_iff`, `MvPowerSeries.X_dvd_iff`: equivalent conditions for (a power of) an indeterminate to divide a `MvPowerSeries` - `MvPolynomial.toMvPowerSeries`: the canonical coercion from `MvPolynomial` to `MvPowerSeries` ## Note This file sets up the (semi)ring structure on multivariate power series: additional results are in: * `Mathlib.RingTheory.MvPowerSeries.Inverse` : invertibility, formal power series over a local ring form a local ring; * `Mathlib.RingTheory.MvPowerSeries.Trunc`: truncation of power series. In `Mathlib.RingTheory.PowerSeries.Basic`, formal power series in one variable will be obtained as a particular case, defined by `PowerSeries R := MvPowerSeries Unit R`. See that file for a specific description. ## Implementation notes In this file we define multivariate formal power series with variables indexed by `σ` and coefficients in `R` as `MvPowerSeries σ R := (σ →₀ ℕ) → R`. Unfortunately there is not yet enough API to show that they are the completion of the ring of multivariate polynomials. However, we provide most of the infrastructure that is needed to do this. Once I-adic completion (topological or algebraic) is available it should not be hard to fill in the details. -/ noncomputable section open Finset (antidiagonal mem_antidiagonal) /-- Multivariate formal power series, where `σ` is the index set of the variables and `R` is the coefficient ring. -/ def MvPowerSeries (σ : Type) (R : Type) := (σ →₀ ℕ) → R namespace MvPowerSeries open Finsupp variable {σ R : Type} instance [Inhabited R] : Inhabited (MvPowerSeries σ R) := ⟨fun _ => default⟩ instance [Zero R] : Zero (MvPowerSeries σ R) := Pi.instZero instance [AddMonoid R] : AddMonoid (MvPowerSeries σ R) := Pi.addMonoid instance [AddGroup R] : AddGroup (MvPowerSeries σ R) := Pi.addGroup instance [AddCommMonoid R] : AddCommMonoid (MvPowerSeries σ R) := Pi.addCommMonoid instance [AddCommGroup R] : AddCommGroup (MvPowerSeries σ R) := Pi.addCommGroup instance [Nontrivial R] : Nontrivial (MvPowerSeries σ R) := Function.nontrivial instance {A} [Semiring R] [AddCommMonoid A] [Module R A] : Module R (MvPowerSeries σ A) := Pi.module _ _ _ instance {A S} [Semiring R] [Semiring S] [AddCommMonoid A] [Module R A] [Module S A] [SMul R S] [IsScalarTower R S A] : IsScalarTower R S (MvPowerSeries σ A) := Pi.isScalarTower section Semiring variable (R) [Semiring R] /-- The `n`th monomial as multivariate formal power series: it is defined as the `R`-linear map from `R` to the semi-ring of multivariate formal power series associating to each `a` the map sending `n : σ →₀ ℕ` to the value `a` and sending all other `x : σ →₀ ℕ` different from `n` to `0`. -/ def monomial (n : σ →₀ ℕ) : R →ₗ[R] MvPowerSeries σ R := letI := Classical.decEq σ LinearMap.single R (fun _ ↦ R) n /-- The `n`th coefficient of a multivariate formal power series. -/ def coeff (n : σ →₀ ℕ) : MvPowerSeries σ R →ₗ[R] R := LinearMap.proj n theorem coeff_apply (f : MvPowerSeries σ R) (d : σ →₀ ℕ) : coeff R d f = f d := rfl variable {R} /-- Two multivariate formal power series are equal if all their coefficients are equal. -/ @[ext] theorem ext {φ ψ} (h : ∀ n : σ →₀ ℕ, coeff R n φ = coeff R n ψ) : φ = ψ := funext h /-- Two multivariate formal power series are equal if and only if all their coefficients are equal. -/ add_decl_doc MvPowerSeries.ext_iff theorem monomial_def [DecidableEq σ] (n : σ →₀ ℕ) : (monomial R n) = LinearMap.single R (fun _ ↦ R) n := by rw [monomial] -- unify the `Decidable` arguments convert rfl theorem coeff_monomial [DecidableEq σ] (m n : σ →₀ ℕ) (a : R) : coeff R m (monomial R n a) = if m = n then a else 0 := by dsimp only [coeff, MvPowerSeries] rw [monomial_def, LinearMap.proj_apply (i := m), LinearMap.single_apply, Pi.single_apply] @[simp] theorem coeff_monomial_same (n : σ →₀ ℕ) (a : R) : coeff R n (monomial R n a) = a := by classical rw [monomial_def] exact Pi.single_eq_same _ _ theorem coeff_monomial_ne {m n : σ →₀ ℕ} (h : m ≠ n) (a : R) : coeff R m (monomial R n a) = 0 := by classical rw [monomial_def] exact Pi.single_eq_of_ne h _ theorem eq_of_coeff_monomial_ne_zero {m n : σ →₀ ℕ} {a : R} (h : coeff R m (monomial R n a) ≠ 0) : m = n := by_contra fun h' => h <\| coeff_monomial_ne h' a @[simp] theorem coeff_comp_monomial (n : σ →₀ ℕ) : (coeff R n).comp (monomial R n) = LinearMap.id := LinearMap.ext <\| coeff_monomial_same n @[simp] theorem coeff_zero (n : σ →₀ ℕ) : coeff R n (0 : MvPowerSeries σ R) = 0 := rfl theorem eq_zero_iff_forall_coeff_zero {f : MvPowerSeries σ R} : f = 0 ↔ (∀ d : σ →₀ ℕ, coeff R d f = 0) := MvPowerSeries.ext_iff theorem ne_zero_iff_exists_coeff_ne_zero (f : MvPowerSeries σ R) : f ≠ 0 ↔ (∃ d : σ →₀ ℕ, coeff R d f ≠ 0) := by simp only [MvPowerSeries.ext_iff, ne_eq, coeff_zero, not_forall] variable (m n : σ →₀ ℕ) (φ ψ : MvPowerSeries σ R) instance : One (MvPowerSeries σ R) := ⟨monomial R (0 : σ →₀ ℕ) 1⟩ theorem coeff_one [DecidableEq σ] : coeff R n (1 : MvPowerSeries σ R) = if n = 0 then 1 else 0 := coeff_monomial _ _ _ theorem coeff_zero_one : coeff R (0 : σ →₀ ℕ) 1 = 1 := coeff_monomial_same 0 1 theorem monomial_zero_one : monomial R (0 : σ →₀ ℕ) 1 = 1 := rfl instance : AddMonoidWithOne (MvPowerSeries σ R) := { show AddMonoid (MvPowerSeries σ R) by infer_instance with natCast := fun n => monomial R 0 n natCast_zero := by simp [Nat.cast] natCast_succ := by simp [Nat.cast, monomial_zero_one] one := 1 } instance : Mul (MvPowerSeries σ R) := letI := Classical.decEq σ ⟨fun φ ψ n => ∑ p ∈ antidiagonal n, coeff R p.1 φ coeff R p.2 ψ⟩ theorem coeff_mul [DecidableEq σ] : coeff R n (φ * ψ) = ∑ p ∈ antidiagonal n, coeff R p.1 φ * coeff R p.2 ψ := by refine Finset.sum_congr ?_ fun _ _ => rfl rw [Subsingleton.elim (Classical.decEq σ) ‹DecidableEq σ›] protected theorem zero_mul : (0 : MvPowerSeries σ R) * φ = 0 := ext fun n => by classical simp [coeff_mul] protected theorem mul_zero : φ * 0 = 0 := ext fun n => by classical simp [coeff_mul] theorem coeff_monomial_mul (a : R) : coeff R m (monomial R n a * φ) = if n ≤ m then a * coeff R (m - n) φ else 0 := by classical have : ∀ p ∈ antidiagonal m, coeff R (p : (σ →₀ ℕ) × (σ →₀ ℕ)).1 (monomial R n a) * coeff R p.2 φ ≠ 0 → p.1 = n := fun p _ hp => eq_of_coeff_monomial_ne_zero (left_ne_zero_of_mul hp) rw [coeff_mul, ← Finset.sum_filter_of_ne this, Finset.filter_fst_eq_antidiagonal _ n, Finset.sum_ite_index] simp only [Finset.sum_singleton, coeff_monomial_same, Finset.sum_empty] theorem coeff_mul_monomial (a : R) : coeff R m (φ * monomial R n a) = if n ≤ m then coeff R (m - n) φ * a else 0 := by classical have : ∀ p ∈ antidiagonal m, coeff R (p : (σ →₀ ℕ) × (σ →₀ ℕ)).1 φ * coeff R p.2 (monomial R n a) ≠ 0 → p.2 = n := fun p _ hp => eq_of_coeff_monomial_ne_zero (right_ne_zero_of_mul hp) rw [coeff_mul, ← Finset.sum_filter_of_ne this, Finset.filter_snd_eq_antidiagonal _ n, Finset.sum_ite_index] simp only [Finset.sum_singleton, coeff_monomial_same, Finset.sum_empty] theorem coeff_add_monomial_mul (a : R) : coeff R (m + n) (monomial R m a * φ) = a * coeff R n φ := by rw [coeff_monomial_mul, if_pos, add_tsub_cancel_left] exact le_add_right le_rfl theorem coeff_add_mul_monomial (a : R) : coeff R (m + n) (φ * monomial R n a) = coeff R m φ * a := by rw [coeff_mul_monomial, if_pos, add_tsub_cancel_right] exact le_add_left le_rfl @[simp] theorem commute_monomial {a : R} {n} :	Commute φ (monomial R n a) ↔ ∀ m, Commute (coeff R m φ) a := by rw [commute_iff_eq, MvPowerSeries.ext_iff]	Mathlib/RingTheory/MvPowerSeries/Basic.lean	263	264
/- 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] lemma realPart_idem {x : A} : ℜ (ℜ x : A) = ℜ x := Subtype.ext <\| (ℜ x).property.coe_realPart @[simp] lemma realPart_imaginaryPart {x : A} : ℜ (ℑ x : A) = ℑ x := Subtype.ext <\| (ℑ x).property.coe_realPart lemma realPart_surjective : Function.Surjective (realPart (A := A)) := fun x ↦ ⟨(x : A), Subtype.ext x.property.coe_realPart⟩ lemma imaginaryPart_surjective : Function.Surjective (imaginaryPart (A := A)) := fun x ↦ ⟨I • (x : A), Subtype.ext <\| by simp only [imaginaryPart_I_smul, x.property.coe_realPart]⟩ open Submodule lemma span_selfAdjoint : span ℂ (selfAdjoint A : Set A) = ⊤ := by refine eq_top_iff'.mpr fun x ↦ ?_ rw [← realPart_add_I_smul_imaginaryPart x] exact add_mem (subset_span (ℜ x).property) <\| SMulMemClass.smul_mem _ <\| subset_span (ℑ x).property /-- The natural `ℝ`-linear equivalence between `selfAdjoint ℂ` and `ℝ`. -/ @[simps apply symm_apply] def Complex.selfAdjointEquiv : selfAdjoint ℂ ≃ₗ[ℝ] ℝ where toFun := fun z ↦ (z : ℂ).re invFun := fun x ↦ ⟨x, conj_ofReal x⟩ left_inv := fun z ↦ Subtype.ext <\| conj_eq_iff_re.mp z.property.star_eq right_inv := fun _ ↦ rfl map_add' := by simp map_smul' := by simp lemma Complex.coe_selfAdjointEquiv (z : selfAdjoint ℂ) : (selfAdjointEquiv z : ℂ) = z := by simpa [selfAdjointEquiv_symm_apply] using (congr_arg Subtype.val <\| Complex.selfAdjointEquiv.left_inv z) @[simp] lemma realPart_ofReal (r : ℝ) : (ℜ (r : ℂ) : ℂ) = r := by rw [realPart_apply_coe, star_def, conj_ofReal, ← two_smul ℝ (r : ℂ)] simp @[simp] lemma imaginaryPart_ofReal (r : ℝ) : ℑ (r : ℂ) = 0 := by ext1; simp [imaginaryPart_apply_coe, conj_ofReal] lemma Complex.coe_realPart (z : ℂ) : (ℜ z : ℂ) = z.re := calc (ℜ z : ℂ) = (↑(ℜ (↑z.re + ↑z.im I))) := by congrm (ℜ $((re_add_im z).symm)) _ = z.re := by rw [map_add, AddSubmonoid.coe_add, mul_comm, ← smul_eq_mul, realPart_I_smul] simp [conj_ofReal, ← two_mul] lemma star_mul_self_add_self_mul_star {A : Type} [NonUnitalNonAssocRing A] [StarRing A] [Module ℂ A] [IsScalarTower ℂ A A] [SMulCommClass ℂ A A] [StarModule ℂ A] (a : A) : star a a + a * star a = 2 • (ℜ a * ℜ a + ℑ a * ℑ a) := have a_eq := (realPart_add_I_smul_imaginaryPart a).symm calc star a * a + a * star a = _ := congr((star $(a_eq)) * $(a_eq) + $(a_eq) * (star $(a_eq))) _ = 2 • (ℜ a * ℜ a + ℑ a * ℑ a) := by simp [mul_add, add_mul, smul_smul, two_smul, mul_smul_comm, smul_mul_assoc] abel end RealImaginaryPart		Mathlib/Data/Complex/Module.lean	524	528
/- 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.Data.List.Nodup import Mathlib.Data.List.Lattice import Batteries.Data.List.Pairwise /-! # Erasure of duplicates in a list This file proves basic results about `List.dedup` (definition in `Data.List.Defs`). `dedup l` returns `l` without its duplicates. It keeps the earliest (that is, rightmost) occurrence of each. ## Tags duplicate, multiplicity, nodup, `nub` -/ universe u namespace List variable {α β : Type*} [DecidableEq α] @[simp] theorem dedup_nil : dedup [] = ([] : List α) := rfl theorem dedup_cons_of_mem' {a : α} {l : List α} (h : a ∈ dedup l) : dedup (a :: l) = dedup l :=	pwFilter_cons_of_neg <\| by simpa only [forall_mem_ne, not_not] using h	Mathlib/Data/List/Dedup.lean	34	35
/- Copyright (c) 2023 Peter Nelson. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Peter Nelson -/ import Mathlib.Data.Finite.Prod import Mathlib.Data.Matroid.Init import Mathlib.Data.Set.Card import Mathlib.Data.Set.Finite.Powerset import Mathlib.Order.UpperLower.Closure /-! # Matroids A `Matroid` is a structure that combinatorially abstracts the notion of linear independence and dependence; matroids have connections with graph theory, discrete optimization, additive combinatorics and algebraic geometry. Mathematically, a matroid `M` is a structure on a set `E` comprising a collection of subsets of `E` called the bases of `M`, where the bases are required to obey certain axioms. This file gives a definition of a matroid `M` in terms of its bases, and some API relating independent sets (subsets of bases) and the notion of a basis of a set `X` (a maximal independent subset of `X`). ## Main definitions * a `Matroid α` on a type `α` is a structure comprising a 'ground set' and a suitably behaved 'base' predicate. Given `M : Matroid α` ... * `M.E` denotes the ground set of `M`, which has type `Set α` * For `B : Set α`, `M.IsBase B` means that `B` is a base of `M`. * For `I : Set α`, `M.Indep I` means that `I` is independent in `M` (that is, `I` is contained in a base of `M`). * For `D : Set α`, `M.Dep D` means that `D` is contained in the ground set of `M` but isn't independent. * For `I : Set α` and `X : Set α`, `M.IsBasis I X` means that `I` is a maximal independent subset of `X`. * `M.Finite` means that `M` has finite ground set. * `M.Nonempty` means that the ground set of `M` is nonempty. * `RankFinite M` means that the bases of `M` are finite. * `RankInfinite M` means that the bases of `M` are infinite. * `RankPos M` means that the bases of `M` are nonempty. * `Finitary M` means that a set is independent if and only if all its finite subsets are independent. * `aesop_mat` : a tactic designed to prove `X ⊆ M.E` for some set `X` and matroid `M`. ## Implementation details There are a few design decisions worth discussing. ### Finiteness The first is that our matroids are allowed to be infinite. Unlike with many mathematical structures, this isn't such an obvious choice. Finite matroids have been studied since the 1930's, and there was never controversy as to what is and isn't an example of a finite matroid - in fact, surprisingly many apparently different definitions of a matroid give rise to the same class of objects. However, generalizing different definitions of a finite matroid to the infinite in the obvious way (i.e. by simply allowing the ground set to be infinite) gives a number of different notions of 'infinite matroid' that disagree with each other, and that all lack nice properties. Many different competing notions of infinite matroid were studied through the years; in fact, the problem of which definition is the best was only really solved in 2013, when Bruhn et al. [2] showed that there is a unique 'reasonable' notion of an infinite matroid (these objects had previously defined by Higgs under the name 'B-matroid'). These are defined by adding one carefully chosen axiom to the standard set, and adapting existing axioms to not mention set cardinalities; they enjoy nearly all the nice properties of standard finite matroids. Even though at least 90% of the literature is on finite matroids, B-matroids are the definition we use, because they allow for additional generality, nearly all theorems are still true and just as easy to state, and (hopefully) the more general definition will prevent the need for a costly future refactor. The disadvantage is that developing API for the finite case is harder work (for instance, it is harder to prove that something is a matroid in the first place, and one must deal with `ℕ∞` rather than `ℕ`). For serious work on finite matroids, we provide the typeclasses `[M.Finite]` and `[RankFinite M]` and associated API. ### Cardinality Just as with bases of a vector space, all bases of a finite matroid `M` are finite and have the same cardinality; this cardinality is an important invariant known as the 'rank' of `M`. For infinite matroids, bases are not in general equicardinal; in fact the equicardinality of bases of infinite matroids is independent of ZFC [3]. What is still true is that either all bases are finite and equicardinal, or all bases are infinite. This means that the natural notion of 'size' for a set in matroid theory is given by the function `Set.encard`, which is the cardinality as a term in `ℕ∞`. We use this function extensively in building the API; it is preferable to both `Set.ncard` and `Finset.card` because it allows infinite sets to be handled without splitting into cases. ### The ground `Set` A last place where we make a consequential choice is making the ground set of a matroid a structure field of type `Set α` (where `α` is the type of 'possible matroid elements') rather than just having a type `α` of all the matroid elements. This is because of how common it is to simultaneously consider a number of matroids on different but related ground sets. For example, a matroid `M` on ground set `E` can have its structure 'restricted' to some subset `R ⊆ E` to give a smaller matroid `M ↾ R` with ground set `R`. A statement like `(M ↾ R₁) ↾ R₂ = M ↾ R₂` is mathematically obvious. But if the ground set of a matroid is a type, this doesn't typecheck, and is only true up to canonical isomorphism. Restriction is just the tip of the iceberg here; one can also 'contract' and 'delete' elements and sets of elements in a matroid to give a smaller matroid, and in practice it is common to make statements like `M₁.E = M₂.E ∩ M₃.E` and `((M ⟋ e) ↾ R) ⟋ C = M ⟋ (C ∪ {e}) ↾ R`. Such things are a nightmare to work with unless `=` is actually propositional equality (especially because the relevant coercions are usually between sets and not just elements). So the solution is that the ground set `M.E` has type `Set α`, and there are elements of type `α` that aren't in the matroid. The tradeoff is that for many statements, one now has to add hypotheses of the form `X ⊆ M.E` to make sure than `X` is actually 'in the matroid', rather than letting a 'type of matroid elements' take care of this invisibly. It still seems that this is worth it. The tactic `aesop_mat` exists specifically to discharge such goals with minimal fuss (using default values). The tactic works fairly well, but has room for improvement. A related decision is to not have matroids themselves be a typeclass. This would make things be notationally simpler (having `Base` in the presence of `[Matroid α]` rather than `M.Base` for a term `M : Matroid α`) but is again just too awkward when one has multiple matroids on the same type. In fact, in regular written mathematics, it is normal to explicitly indicate which matroid something is happening in, so our notation mirrors common practice. ### Notation We use a few nonstandard conventions in theorem names that are related to the above. First, we mirror common informal practice by referring explicitly to the `ground` set rather than the notation `E`. (Writing `ground` everywhere in a proof term would be unwieldy, and writing `E` in theorem names would be unnatural to read.) Second, because we are typically interested in subsets of the ground set `M.E`, using `Set.compl` is inconvenient, since `Xᶜ ⊆ M.E` is typically false for `X ⊆ M.E`. On the other hand (especially when duals arise), it is common to complement a set `X ⊆ M.E` within the ground set, giving `M.E \ X`. For this reason, we use the term `compl` in theorem names to refer to taking a set difference with respect to the ground set, rather than a complement within a type. The lemma `compl_isBase_dual` is one of the many examples of this. Finally, in theorem names, matroid predicates that apply to sets (such as `Base`, `Indep`, `IsBasis`) are typically used as suffixes rather than prefixes. For instance, we have `ground_indep_iff_isBase` rather than `indep_ground_iff_isBase`. ## References * [J. Oxley, Matroid Theory][oxley2011] * [H. Bruhn, R. Diestel, M. Kriesell, R. Pendavingh, P. Wollan, Axioms for infinite matroids, Adv. Math 239 (2013), 18-46][bruhnDiestelKriesselPendavinghWollan2013] * [N. Bowler, S. Geschke, Self-dual uniform matroids on infinite sets, Proc. Amer. Math. Soc. 144 (2016), 459-471][bowlerGeschke2015] -/ assert_not_exists Field open Set /-- A predicate `P` on sets satisfies the exchange property if, for all `X` and `Y` satisfying `P` and all `a ∈ X \ Y`, there exists `b ∈ Y \ X` so that swapping `a` for `b` in `X` maintains `P`. -/ def Matroid.ExchangeProperty {α : Type} (P : Set α → Prop) : Prop := ∀ X Y, P X → P Y → ∀ a ∈ X \ Y, ∃ b ∈ Y \ X, P (insert b (X \ {a})) /-- A set `X` has the maximal subset property for a predicate `P` if every subset of `X` satisfying `P` is contained in a maximal subset of `X` satisfying `P`. -/ def Matroid.ExistsMaximalSubsetProperty {α : Type} (P : Set α → Prop) (X : Set α) : Prop := ∀ I, P I → I ⊆ X → ∃ J, I ⊆ J ∧ Maximal (fun K ↦ P K ∧ K ⊆ X) J /-- A `Matroid α` is a ground set `E` of type `Set α`, and a nonempty collection of its subsets satisfying the exchange property and the maximal subset property. Each such set is called a `Base` of `M`. An `Indep`endent set is just a set contained in a base, but we include this predicate as a structure field for better definitional properties. In most cases, using this definition directly is not the best way to construct a matroid, since it requires specifying both the bases and independent sets. If the bases are known, use `Matroid.ofBase` or a variant. If just the independent sets are known, define an `IndepMatroid`, and then use `IndepMatroid.matroid`. -/ structure Matroid (α : Type) where /-- `M` has a ground set `E`. -/ (E : Set α) /-- `M` has a predicate `Base` defining its bases. -/ (IsBase : Set α → Prop) /-- `M` has a predicate `Indep` defining its independent sets. -/ (Indep : Set α → Prop) /-- The `Indep`endent sets are those contained in `Base`s. -/ (indep_iff' : ∀ ⦃I⦄, Indep I ↔ ∃ B, IsBase B ∧ I ⊆ B) /-- There is at least one `Base`. -/ (exists_isBase : ∃ B, IsBase B) /-- For any bases `B`, `B'` and `e ∈ B \ B'`, there is some `f ∈ B' \ B` for which `B-e+f` is a base. -/ (isBase_exchange : Matroid.ExchangeProperty IsBase) /-- Every independent subset `I` of a set `X` for is contained in a maximal independent subset of `X`. -/ (maximality : ∀ X, X ⊆ E → Matroid.ExistsMaximalSubsetProperty Indep X) /-- Every base is contained in the ground set. -/ (subset_ground : ∀ B, IsBase B → B ⊆ E) attribute [local ext] Matroid namespace Matroid variable {α : Type} {M : Matroid α} @[deprecated (since := "2025-02-14")] alias Base := IsBase instance (M : Matroid α) : Nonempty {B // M.IsBase B} := nonempty_subtype.2 M.exists_isBase /-- Typeclass for a matroid having finite ground set. Just a wrapper for `M.E.Finite`. -/ @[mk_iff] protected class Finite (M : Matroid α) : Prop where /-- The ground set is finite -/ (ground_finite : M.E.Finite) /-- Typeclass for a matroid having nonempty ground set. Just a wrapper for `M.E.Nonempty`. -/ protected class Nonempty (M : Matroid α) : Prop where /-- The ground set is nonempty -/ (ground_nonempty : M.E.Nonempty) theorem ground_nonempty (M : Matroid α) [M.Nonempty] : M.E.Nonempty := Nonempty.ground_nonempty theorem ground_nonempty_iff (M : Matroid α) : M.E.Nonempty ↔ M.Nonempty := ⟨fun h ↦ ⟨h⟩, fun ⟨h⟩ ↦ h⟩ lemma nonempty_type (M : Matroid α) [h : M.Nonempty] : Nonempty α := ⟨M.ground_nonempty.some⟩ theorem ground_finite (M : Matroid α) [M.Finite] : M.E.Finite := Finite.ground_finite theorem set_finite (M : Matroid α) [M.Finite] (X : Set α) (hX : X ⊆ M.E := by aesop) : X.Finite := M.ground_finite.subset hX instance finite_of_finite [Finite α] {M : Matroid α} : M.Finite := ⟨Set.toFinite _⟩ /-- A `RankFinite` matroid is one whose bases are finite -/ @[mk_iff] class RankFinite (M : Matroid α) : Prop where /-- There is a finite base -/ exists_finite_isBase : ∃ B, M.IsBase B ∧ B.Finite @[deprecated (since := "2025-02-09")] alias FiniteRk := RankFinite instance rankFinite_of_finite (M : Matroid α) [M.Finite] : RankFinite M := ⟨M.exists_isBase.imp (fun B hB ↦ ⟨hB, M.set_finite B (M.subset_ground _ hB)⟩)⟩ /-- An `RankInfinite` matroid is one whose bases are infinite. -/ @[mk_iff] class RankInfinite (M : Matroid α) : Prop where /-- There is an infinite base -/ exists_infinite_isBase : ∃ B, M.IsBase B ∧ B.Infinite @[deprecated (since := "2025-02-09")] alias InfiniteRk := RankInfinite /-- A `RankPos` matroid is one whose bases are nonempty. -/ @[mk_iff] class RankPos (M : Matroid α) : Prop where /-- The empty set isn't a base -/ empty_not_isBase : ¬M.IsBase ∅ @[deprecated (since := "2025-02-09")] alias RkPos := RankPos instance rankPos_nonempty {M : Matroid α} [M.RankPos] : M.Nonempty := by obtain ⟨B, hB⟩ := M.exists_isBase obtain rfl \| ⟨e, heB⟩ := B.eq_empty_or_nonempty · exact False.elim <\| RankPos.empty_not_isBase hB exact ⟨e, M.subset_ground B hB heB ⟩ @[deprecated (since := "2025-01-20")] alias rkPos_iff_empty_not_base := rankPos_iff section exchange namespace ExchangeProperty variable {IsBase : Set α → Prop} {B B' : Set α} /-- A family of sets with the exchange property is an antichain. -/ theorem antichain (exch : ExchangeProperty IsBase) (hB : IsBase B) (hB' : IsBase B') (h : B ⊆ B') : B = B' := h.antisymm (fun x hx ↦ by_contra (fun hxB ↦ let ⟨_, hy, _⟩ := exch B' B hB' hB x ⟨hx, hxB⟩; hy.2 <\| h hy.1)) theorem encard_diff_le_aux {B₁ B₂ : Set α} (exch : ExchangeProperty IsBase) (hB₁ : IsBase B₁) (hB₂ : IsBase B₂) : (B₁ \ B₂).encard ≤ (B₂ \ B₁).encard := by obtain (he \| hinf \| ⟨e, he, hcard⟩) := (B₂ \ B₁).eq_empty_or_encard_eq_top_or_encard_diff_singleton_lt · rw [exch.antichain hB₂ hB₁ (diff_eq_empty.mp he)] · exact le_top.trans_eq hinf.symm obtain ⟨f, hf, hB'⟩ := exch B₂ B₁ hB₂ hB₁ e he have : encard (insert f (B₂ \ {e}) \ B₁) < encard (B₂ \ B₁) := by rw [insert_diff_of_mem _ hf.1, diff_diff_comm]; exact hcard have hencard := encard_diff_le_aux exch hB₁ hB' rw [insert_diff_of_mem _ hf.1, diff_diff_comm, ← union_singleton, ← diff_diff, diff_diff_right, inter_singleton_eq_empty.mpr he.2, union_empty] at hencard rw [← encard_diff_singleton_add_one he, ← encard_diff_singleton_add_one hf] exact add_le_add_right hencard 1 termination_by (B₂ \ B₁).encard variable {B₁ B₂ : Set α} /-- For any two sets `B₁`, `B₂` in a family with the exchange property, the differences `B₁ \ B₂` and `B₂ \ B₁` have the same `ℕ∞`-cardinality. -/ theorem encard_diff_eq (exch : ExchangeProperty IsBase) (hB₁ : IsBase B₁) (hB₂ : IsBase B₂) : (B₁ \ B₂).encard = (B₂ \ B₁).encard := (encard_diff_le_aux exch hB₁ hB₂).antisymm (encard_diff_le_aux exch hB₂ hB₁) /-- Any two sets `B₁`, `B₂` in a family with the exchange property have the same `ℕ∞`-cardinality. -/ theorem encard_isBase_eq (exch : ExchangeProperty IsBase) (hB₁ : IsBase B₁) (hB₂ : IsBase B₂) : B₁.encard = B₂.encard := by rw [← encard_diff_add_encard_inter B₁ B₂, exch.encard_diff_eq hB₁ hB₂, inter_comm, encard_diff_add_encard_inter] end ExchangeProperty end exchange section aesop /-- The `aesop_mat` tactic attempts to prove a set is contained in the ground set of a matroid. It uses a `[Matroid]` ruleset, and is allowed to fail. -/ macro (name := aesop_mat) "aesop_mat" c:Aesop.tactic_clause* : tactic => `(tactic\| aesop $c* (config := { terminal := true }) (rule_sets := [$(Lean.mkIdent `Matroid):ident])) /- We add a number of trivial lemmas (deliberately specialized to statements in terms of the ground set of a matroid) to the ruleset `Matroid` for `aesop`. -/ variable {X Y : Set α} {e : α} @[aesop unsafe 5% (rule_sets := [Matroid])] private theorem inter_right_subset_ground (hX : X ⊆ M.E) : X ∩ Y ⊆ M.E := inter_subset_left.trans hX @[aesop unsafe 5% (rule_sets := [Matroid])] private theorem inter_left_subset_ground (hX : X ⊆ M.E) : Y ∩ X ⊆ M.E := inter_subset_right.trans hX @[aesop unsafe 5% (rule_sets := [Matroid])] private theorem diff_subset_ground (hX : X ⊆ M.E) : X \ Y ⊆ M.E := diff_subset.trans hX @[aesop unsafe 10% (rule_sets := [Matroid])] private theorem ground_diff_subset_ground : M.E \ X ⊆ M.E := diff_subset_ground rfl.subset @[aesop unsafe 10% (rule_sets := [Matroid])] private theorem singleton_subset_ground (he : e ∈ M.E) : {e} ⊆ M.E := singleton_subset_iff.mpr he @[aesop unsafe 5% (rule_sets := [Matroid])] private theorem subset_ground_of_subset (hXY : X ⊆ Y) (hY : Y ⊆ M.E) : X ⊆ M.E := hXY.trans hY @[aesop unsafe 5% (rule_sets := [Matroid])] private theorem mem_ground_of_mem_of_subset (hX : X ⊆ M.E) (heX : e ∈ X) : e ∈ M.E := hX heX @[aesop safe (rule_sets := [Matroid])] private theorem insert_subset_ground {e : α} {X : Set α} {M : Matroid α} (he : e ∈ M.E) (hX : X ⊆ M.E) : insert e X ⊆ M.E := insert_subset he hX @[aesop safe (rule_sets := [Matroid])] private theorem ground_subset_ground {M : Matroid α} : M.E ⊆ M.E := rfl.subset attribute [aesop safe (rule_sets := [Matroid])] empty_subset union_subset iUnion_subset end aesop section IsBase variable {B B₁ B₂ : Set α} @[aesop unsafe 10% (rule_sets := [Matroid])] theorem IsBase.subset_ground (hB : M.IsBase B) : B ⊆ M.E := M.subset_ground B hB theorem IsBase.exchange {e : α} (hB₁ : M.IsBase B₁) (hB₂ : M.IsBase B₂) (hx : e ∈ B₁ \ B₂) : ∃ y ∈ B₂ \ B₁, M.IsBase (insert y (B₁ \ {e})) := M.isBase_exchange B₁ B₂ hB₁ hB₂ _ hx theorem IsBase.exchange_mem {e : α} (hB₁ : M.IsBase B₁) (hB₂ : M.IsBase B₂) (hxB₁ : e ∈ B₁) (hxB₂ : e ∉ B₂) : ∃ y, (y ∈ B₂ ∧ y ∉ B₁) ∧ M.IsBase (insert y (B₁ \ {e})) := by simpa using hB₁.exchange hB₂ ⟨hxB₁, hxB₂⟩ theorem IsBase.eq_of_subset_isBase (hB₁ : M.IsBase B₁) (hB₂ : M.IsBase B₂) (hB₁B₂ : B₁ ⊆ B₂) : B₁ = B₂ := M.isBase_exchange.antichain hB₁ hB₂ hB₁B₂ theorem IsBase.not_isBase_of_ssubset {X : Set α} (hB : M.IsBase B) (hX : X ⊂ B) : ¬ M.IsBase X := fun h ↦ hX.ne (h.eq_of_subset_isBase hB hX.subset) theorem IsBase.insert_not_isBase {e : α} (hB : M.IsBase B) (heB : e ∉ B) : ¬ M.IsBase (insert e B) := fun h ↦ h.not_isBase_of_ssubset (ssubset_insert heB) hB theorem IsBase.encard_diff_comm (hB₁ : M.IsBase B₁) (hB₂ : M.IsBase B₂) : (B₁ \ B₂).encard = (B₂ \ B₁).encard := M.isBase_exchange.encard_diff_eq hB₁ hB₂ theorem IsBase.ncard_diff_comm (hB₁ : M.IsBase B₁) (hB₂ : M.IsBase B₂) : (B₁ \ B₂).ncard = (B₂ \ B₁).ncard := by rw [ncard_def, hB₁.encard_diff_comm hB₂, ← ncard_def] theorem IsBase.encard_eq_encard_of_isBase (hB₁ : M.IsBase B₁) (hB₂ : M.IsBase B₂) : B₁.encard = B₂.encard := by rw [M.isBase_exchange.encard_isBase_eq hB₁ hB₂] theorem IsBase.ncard_eq_ncard_of_isBase (hB₁ : M.IsBase B₁) (hB₂ : M.IsBase B₂) : B₁.ncard = B₂.ncard := by rw [ncard_def B₁, hB₁.encard_eq_encard_of_isBase hB₂, ← ncard_def] theorem IsBase.finite_of_finite {B' : Set α} (hB : M.IsBase B) (h : B.Finite) (hB' : M.IsBase B') : B'.Finite := (finite_iff_finite_of_encard_eq_encard (hB.encard_eq_encard_of_isBase hB')).mp h theorem IsBase.infinite_of_infinite (hB : M.IsBase B) (h : B.Infinite) (hB₁ : M.IsBase B₁) : B₁.Infinite := by_contra (fun hB_inf ↦ (hB₁.finite_of_finite (not_infinite.mp hB_inf) hB).not_infinite h) theorem IsBase.finite [RankFinite M] (hB : M.IsBase B) : B.Finite := let ⟨_,hB₀⟩ := ‹RankFinite M›.exists_finite_isBase hB₀.1.finite_of_finite hB₀.2 hB theorem IsBase.infinite [RankInfinite M] (hB : M.IsBase B) : B.Infinite := let ⟨_,hB₀⟩ := ‹RankInfinite M›.exists_infinite_isBase hB₀.1.infinite_of_infinite hB₀.2 hB theorem empty_not_isBase [h : RankPos M] : ¬M.IsBase ∅ := h.empty_not_isBase theorem IsBase.nonempty [RankPos M] (hB : M.IsBase B) : B.Nonempty := by rw [nonempty_iff_ne_empty]; rintro rfl; exact M.empty_not_isBase hB theorem IsBase.rankPos_of_nonempty (hB : M.IsBase B) (h : B.Nonempty) : M.RankPos := by rw [rankPos_iff] intro he obtain rfl := he.eq_of_subset_isBase hB (empty_subset B) simp at h theorem IsBase.rankFinite_of_finite (hB : M.IsBase B) (hfin : B.Finite) : RankFinite M := ⟨⟨B, hB, hfin⟩⟩ theorem IsBase.rankInfinite_of_infinite (hB : M.IsBase B) (h : B.Infinite) : RankInfinite M := ⟨⟨B, hB, h⟩⟩ theorem not_rankFinite (M : Matroid α) [RankInfinite M] : ¬ RankFinite M := by intro h; obtain ⟨B,hB⟩ := M.exists_isBase; exact hB.infinite hB.finite theorem not_rankInfinite (M : Matroid α) [RankFinite M] : ¬ RankInfinite M := by intro h; obtain ⟨B,hB⟩ := M.exists_isBase; exact hB.infinite hB.finite theorem rankFinite_or_rankInfinite (M : Matroid α) : RankFinite M ∨ RankInfinite M := let ⟨B, hB⟩ := M.exists_isBase B.finite_or_infinite.imp hB.rankFinite_of_finite hB.rankInfinite_of_infinite @[deprecated (since := "2025-03-27")] alias finite_or_rankInfinite := rankFinite_or_rankInfinite @[simp] theorem not_rankFinite_iff (M : Matroid α) : ¬ RankFinite M ↔ RankInfinite M := M.rankFinite_or_rankInfinite.elim (fun h ↦ iff_of_false (by simpa) M.not_rankInfinite) fun h ↦ iff_of_true M.not_rankFinite h @[simp] theorem not_rankInfinite_iff (M : Matroid α) : ¬ RankInfinite M ↔ RankFinite M := by rw [← not_rankFinite_iff, not_not] theorem IsBase.diff_finite_comm (hB₁ : M.IsBase B₁) (hB₂ : M.IsBase B₂) : (B₁ \ B₂).Finite ↔ (B₂ \ B₁).Finite := finite_iff_finite_of_encard_eq_encard (hB₁.encard_diff_comm hB₂) theorem IsBase.diff_infinite_comm (hB₁ : M.IsBase B₁) (hB₂ : M.IsBase B₂) : (B₁ \ B₂).Infinite ↔ (B₂ \ B₁).Infinite := infinite_iff_infinite_of_encard_eq_encard (hB₁.encard_diff_comm hB₂) theorem ext_isBase {M₁ M₂ : Matroid α} (hE : M₁.E = M₂.E) (h : ∀ ⦃B⦄, B ⊆ M₁.E → (M₁.IsBase B ↔ M₂.IsBase B)) : M₁ = M₂ := by have h' : ∀ B, M₁.IsBase B ↔ M₂.IsBase B := fun B ↦ ⟨fun hB ↦ (h hB.subset_ground).1 hB, fun hB ↦ (h <\| hB.subset_ground.trans_eq hE.symm).2 hB⟩ ext <;> simp [hE, M₁.indep_iff', M₂.indep_iff', h'] @[deprecated (since := "2024-12-25")] alias eq_of_isBase_iff_isBase_forall := ext_isBase theorem ext_iff_isBase {M₁ M₂ : Matroid α} : M₁ = M₂ ↔ M₁.E = M₂.E ∧ ∀ ⦃B⦄, B ⊆ M₁.E → (M₁.IsBase B ↔ M₂.IsBase B) := ⟨fun h ↦ by simp [h], fun ⟨hE, h⟩ ↦ ext_isBase hE h⟩ theorem isBase_compl_iff_maximal_disjoint_isBase (hB : B ⊆ M.E := by aesop_mat) : M.IsBase (M.E \ B) ↔ Maximal (fun I ↦ I ⊆ M.E ∧ ∃ B, M.IsBase B ∧ Disjoint I B) B := by simp_rw [maximal_iff, and_iff_right hB, and_imp, forall_exists_index] refine ⟨fun h ↦ ⟨⟨_, h, disjoint_sdiff_right⟩, fun I hI B' ⟨hB', hIB'⟩ hBI ↦ hBI.antisymm ?_⟩, fun ⟨⟨B', hB', hBB'⟩,h⟩ ↦ ?_⟩ · rw [hB'.eq_of_subset_isBase h, ← subset_compl_iff_disjoint_right, diff_eq, compl_inter, compl_compl] at hIB' · exact fun e he ↦ (hIB' he).elim (fun h' ↦ (h' (hI he)).elim) id rw [subset_diff, and_iff_right hB'.subset_ground, disjoint_comm] exact disjoint_of_subset_left hBI hIB' rw [h diff_subset B' ⟨hB', disjoint_sdiff_left⟩] · simpa [hB'.subset_ground] simp [subset_diff, hB, hBB'] end IsBase section dep_indep /-- A subset of `M.E` is `Dep`endent if it is not `Indep`endent . -/ def Dep (M : Matroid α) (D : Set α) : Prop := ¬M.Indep D ∧ D ⊆ M.E variable {B B' I J D X : Set α} {e f : α} theorem indep_iff : M.Indep I ↔ ∃ B, M.IsBase B ∧ I ⊆ B := M.indep_iff' (I := I) theorem setOf_indep_eq (M : Matroid α) : {I \| M.Indep I} = lowerClosure ({B \| M.IsBase B}) := by simp_rw [indep_iff, lowerClosure, LowerSet.coe_mk, mem_setOf, le_eq_subset] theorem Indep.exists_isBase_superset (hI : M.Indep I) : ∃ B, M.IsBase B ∧ I ⊆ B := indep_iff.1 hI theorem dep_iff : M.Dep D ↔ ¬M.Indep D ∧ D ⊆ M.E := Iff.rfl theorem setOf_dep_eq (M : Matroid α) : {D \| M.Dep D} = {I \| M.Indep I}ᶜ ∩ Iic M.E := rfl @[aesop unsafe 30% (rule_sets := [Matroid])] theorem Indep.subset_ground (hI : M.Indep I) : I ⊆ M.E := by obtain ⟨B, hB, hIB⟩ := hI.exists_isBase_superset exact hIB.trans hB.subset_ground @[aesop unsafe 20% (rule_sets := [Matroid])] theorem Dep.subset_ground (hD : M.Dep D) : D ⊆ M.E := hD.2 theorem indep_or_dep (hX : X ⊆ M.E := by aesop_mat) : M.Indep X ∨ M.Dep X := by rw [Dep, and_iff_left hX] apply em theorem Indep.not_dep (hI : M.Indep I) : ¬ M.Dep I := fun h ↦ h.1 hI theorem Dep.not_indep (hD : M.Dep D) : ¬ M.Indep D := hD.1 theorem dep_of_not_indep (hD : ¬ M.Indep D) (hDE : D ⊆ M.E := by aesop_mat) : M.Dep D := ⟨hD, hDE⟩ theorem indep_of_not_dep (hI : ¬ M.Dep I) (hIE : I ⊆ M.E := by aesop_mat) : M.Indep I := by_contra (fun h ↦ hI ⟨h, hIE⟩) @[simp] theorem not_dep_iff (hX : X ⊆ M.E := by aesop_mat) : ¬ M.Dep X ↔ M.Indep X := by rw [Dep, and_iff_left hX, not_not] @[simp] theorem not_indep_iff (hX : X ⊆ M.E := by aesop_mat) : ¬ M.Indep X ↔ M.Dep X := by rw [Dep, and_iff_left hX] theorem indep_iff_not_dep : M.Indep I ↔ ¬M.Dep I ∧ I ⊆ M.E := by rw [dep_iff, not_and, not_imp_not] exact ⟨fun h ↦ ⟨fun _ ↦ h, h.subset_ground⟩, fun h ↦ h.1 h.2⟩ theorem Indep.subset (hJ : M.Indep J) (hIJ : I ⊆ J) : M.Indep I := by obtain ⟨B, hB, hJB⟩ := hJ.exists_isBase_superset exact indep_iff.2 ⟨B, hB, hIJ.trans hJB⟩ theorem Dep.superset (hD : M.Dep D) (hDX : D ⊆ X) (hXE : X ⊆ M.E := by aesop_mat) : M.Dep X := dep_of_not_indep (fun hI ↦ (hI.subset hDX).not_dep hD) theorem IsBase.indep (hB : M.IsBase B) : M.Indep B := indep_iff.2 ⟨B, hB, subset_rfl⟩ @[simp] theorem empty_indep (M : Matroid α) : M.Indep ∅ := Exists.elim M.exists_isBase (fun _ hB ↦ hB.indep.subset (empty_subset _)) theorem Dep.nonempty (hD : M.Dep D) : D.Nonempty := by rw [nonempty_iff_ne_empty]; rintro rfl; exact hD.not_indep M.empty_indep theorem Indep.finite [RankFinite M] (hI : M.Indep I) : I.Finite := let ⟨_, hB, hIB⟩ := hI.exists_isBase_superset hB.finite.subset hIB theorem Indep.rankPos_of_nonempty (hI : M.Indep I) (hne : I.Nonempty) : M.RankPos := by obtain ⟨B, hB, hIB⟩ := hI.exists_isBase_superset exact hB.rankPos_of_nonempty (hne.mono hIB) theorem Indep.inter_right (hI : M.Indep I) (X : Set α) : M.Indep (I ∩ X) := hI.subset inter_subset_left theorem Indep.inter_left (hI : M.Indep I) (X : Set α) : M.Indep (X ∩ I) := hI.subset inter_subset_right theorem Indep.diff (hI : M.Indep I) (X : Set α) : M.Indep (I \ X) := hI.subset diff_subset theorem IsBase.eq_of_subset_indep (hB : M.IsBase B) (hI : M.Indep I) (hBI : B ⊆ I) : B = I := let ⟨B', hB', hB'I⟩ := hI.exists_isBase_superset hBI.antisymm (by rwa [hB.eq_of_subset_isBase hB' (hBI.trans hB'I)]) theorem isBase_iff_maximal_indep : M.IsBase B ↔ Maximal M.Indep B := by rw [maximal_subset_iff] refine ⟨fun h ↦ ⟨h.indep, fun _ ↦ h.eq_of_subset_indep⟩, fun ⟨h, h'⟩ ↦ ?_⟩	obtain ⟨B', hB', hBB'⟩ := h.exists_isBase_superset rwa [h' hB'.indep hBB'] theorem Indep.isBase_of_maximal (hI : M.Indep I) (h : ∀ ⦃J⦄, M.Indep J → I ⊆ J → I = J) : M.IsBase I := by rwa [isBase_iff_maximal_indep, maximal_subset_iff, and_iff_right hI] theorem IsBase.dep_of_ssubset (hB : M.IsBase B) (h : B ⊂ X) (hX : X ⊆ M.E := by aesop_mat) : M.Dep X :=	Mathlib/Data/Matroid/Basic.lean	615	623
/- Copyright (c) 2021 Eric Wieser. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Eric Wieser -/ import Mathlib.Algebra.DualNumber import Mathlib.Algebra.QuaternionBasis import Mathlib.Data.Complex.Module import Mathlib.LinearAlgebra.CliffordAlgebra.Conjugation import Mathlib.LinearAlgebra.CliffordAlgebra.Star import Mathlib.LinearAlgebra.QuadraticForm.Prod /-! # Other constructions isomorphic to Clifford Algebras This file contains isomorphisms showing that other types are equivalent to some `CliffordAlgebra`. ## Rings * `CliffordAlgebraRing.equiv`: any ring is equivalent to a `CliffordAlgebra` over a zero-dimensional vector space. ## Complex numbers * `CliffordAlgebraComplex.equiv`: the `Complex` numbers are equivalent as an `ℝ`-algebra to a `CliffordAlgebra` over a one-dimensional vector space with a quadratic form that satisfies `Q (ι Q 1) = -1`. * `CliffordAlgebraComplex.toComplex`: the forward direction of this equiv * `CliffordAlgebraComplex.ofComplex`: the reverse direction of this equiv We show additionally that this equivalence sends `Complex.conj` to `CliffordAlgebra.involute` and vice-versa: * `CliffordAlgebraComplex.toComplex_involute` * `CliffordAlgebraComplex.ofComplex_conj` Note that in this algebra `CliffordAlgebra.reverse` is the identity and so the clifford conjugate is the same as `CliffordAlgebra.involute`. ## Quaternion algebras * `CliffordAlgebraQuaternion.equiv`: a `QuaternionAlgebra` over `R` is equivalent as an `R`-algebra to a clifford algebra over `R × R`, sending `i` to `(0, 1)` and `j` to `(1, 0)`. * `CliffordAlgebraQuaternion.toQuaternion`: the forward direction of this equiv * `CliffordAlgebraQuaternion.ofQuaternion`: the reverse direction of this equiv We show additionally that this equivalence sends `QuaternionAlgebra.conj` to the clifford conjugate and vice-versa: * `CliffordAlgebraQuaternion.toQuaternion_star` * `CliffordAlgebraQuaternion.ofQuaternion_star` ## Dual numbers * `CliffordAlgebraDualNumber.equiv`: `R[ε]` is equivalent as an `R`-algebra to a clifford algebra over `R` where `Q = 0`. -/ open CliffordAlgebra /-! ### The clifford algebra isomorphic to a ring -/ namespace CliffordAlgebraRing open scoped ComplexConjugate variable {R : Type} [CommRing R] @[simp] theorem ι_eq_zero : ι (0 : QuadraticForm R Unit) = 0 := Subsingleton.elim _ _ /-- Since the vector space is empty the ring is commutative. -/ instance : CommRing (CliffordAlgebra (0 : QuadraticForm R Unit)) := { CliffordAlgebra.instRing _ with mul_comm := fun x y => by induction x using CliffordAlgebra.induction with \| algebraMap r => apply Algebra.commutes \| ι x => simp \| add x₁ x₂ hx₁ hx₂ => rw [mul_add, add_mul, hx₁, hx₂] \| mul x₁ x₂ hx₁ hx₂ => rw [mul_assoc, hx₂, ← mul_assoc, hx₁, ← mul_assoc] } theorem reverse_apply (x : CliffordAlgebra (0 : QuadraticForm R Unit)) : x.reverse = x := by induction x using CliffordAlgebra.induction with \| algebraMap r => exact reverse.commutes _ \| ι x => rw [ι_eq_zero, LinearMap.zero_apply, reverse.map_zero] \| mul x₁ x₂ hx₁ hx₂ => rw [reverse.map_mul, mul_comm, hx₁, hx₂] \| add x₁ x₂ hx₁ hx₂ => rw [reverse.map_add, hx₁, hx₂] @[simp] theorem reverse_eq_id : (reverse : CliffordAlgebra (0 : QuadraticForm R Unit) →ₗ[R] _) = LinearMap.id := LinearMap.ext reverse_apply @[simp] theorem involute_eq_id : (involute : CliffordAlgebra (0 : QuadraticForm R Unit) →ₐ[R] _) = AlgHom.id R _ := by ext; simp /-- The clifford algebra over a 0-dimensional vector space is isomorphic to its scalars. -/ protected def equiv : CliffordAlgebra (0 : QuadraticForm R Unit) ≃ₐ[R] R := AlgEquiv.ofAlgHom (CliffordAlgebra.lift (0 : QuadraticForm R Unit) <\| ⟨0, fun _ : Unit => (zero_mul (0 : R)).trans (algebraMap R _).map_zero.symm⟩) (Algebra.ofId R _) (by ext) (by ext : 1; rw [ι_eq_zero, LinearMap.comp_zero, LinearMap.comp_zero]) end CliffordAlgebraRing /-! ### The clifford algebra isomorphic to the complex numbers -/ namespace CliffordAlgebraComplex open scoped ComplexConjugate /-- The quadratic form sending elements to the negation of their square. -/ def Q : QuadraticForm ℝ ℝ := -QuadraticMap.sq @[simp] theorem Q_apply (r : ℝ) : Q r = -(r r) := rfl /-- Intermediate result for `CliffordAlgebraComplex.equiv`: clifford algebras over `CliffordAlgebraComplex.Q` above can be converted to `ℂ`. -/ def toComplex : CliffordAlgebra Q →ₐ[ℝ] ℂ := CliffordAlgebra.lift Q ⟨LinearMap.toSpanSingleton _ _ Complex.I, fun r => by dsimp [LinearMap.toSpanSingleton, LinearMap.id] rw [mul_mul_mul_comm] simp⟩ @[simp] theorem toComplex_ι (r : ℝ) : toComplex (ι Q r) = r • Complex.I := CliffordAlgebra.lift_ι_apply _ _ r /-- `CliffordAlgebra.involute` is analogous to `Complex.conj`. -/ @[simp] theorem toComplex_involute (c : CliffordAlgebra Q) : toComplex (involute c) = conj (toComplex c) := by have : toComplex (involute (ι Q 1)) = conj (toComplex (ι Q 1)) := by simp only [involute_ι, toComplex_ι, map_neg, one_smul, Complex.conj_I] suffices toComplex.comp involute = Complex.conjAe.toAlgHom.comp toComplex by exact AlgHom.congr_fun this c ext : 2 exact this /-- Intermediate result for `CliffordAlgebraComplex.equiv`: `ℂ` can be converted to `CliffordAlgebraComplex.Q` above can be converted to. -/ def ofComplex : ℂ →ₐ[ℝ] CliffordAlgebra Q := Complex.lift ⟨CliffordAlgebra.ι Q 1, by rw [CliffordAlgebra.ι_sq_scalar, Q_apply, one_mul, RingHom.map_neg, RingHom.map_one]⟩ @[simp] theorem ofComplex_I : ofComplex Complex.I = ι Q 1 := Complex.liftAux_apply_I _ (by simp) @[simp] theorem toComplex_comp_ofComplex : toComplex.comp ofComplex = AlgHom.id ℝ ℂ := by ext1 dsimp only [AlgHom.comp_apply, Subtype.coe_mk, AlgHom.id_apply] rw [ofComplex_I, toComplex_ι, one_smul] @[simp] theorem toComplex_ofComplex (c : ℂ) : toComplex (ofComplex c) = c := AlgHom.congr_fun toComplex_comp_ofComplex c @[simp] theorem ofComplex_comp_toComplex : ofComplex.comp toComplex = AlgHom.id ℝ (CliffordAlgebra Q) := by ext dsimp only [LinearMap.comp_apply, Subtype.coe_mk, AlgHom.id_apply, AlgHom.toLinearMap_apply, AlgHom.comp_apply] rw [toComplex_ι, one_smul, ofComplex_I] @[simp] theorem ofComplex_toComplex (c : CliffordAlgebra Q) : ofComplex (toComplex c) = c := AlgHom.congr_fun ofComplex_comp_toComplex c /-- The clifford algebras over `CliffordAlgebraComplex.Q` is isomorphic as an `ℝ`-algebra to `ℂ`. -/ @[simps!] protected def equiv : CliffordAlgebra Q ≃ₐ[ℝ] ℂ := AlgEquiv.ofAlgHom toComplex ofComplex toComplex_comp_ofComplex ofComplex_comp_toComplex /-- The clifford algebra is commutative since it is isomorphic to the complex numbers. TODO: prove this is true for all `CliffordAlgebra`s over a 1-dimensional vector space. -/ instance : CommRing (CliffordAlgebra Q) := { CliffordAlgebra.instRing _ with mul_comm := fun x y => CliffordAlgebraComplex.equiv.injective <\| by rw [map_mul, mul_comm, map_mul] } /-- `reverse` is a no-op over `CliffordAlgebraComplex.Q`. -/ theorem reverse_apply (x : CliffordAlgebra Q) : x.reverse = x := by induction x using CliffordAlgebra.induction with \| algebraMap r => exact reverse.commutes _ \| ι x => rw [reverse_ι] \| mul x₁ x₂ hx₁ hx₂ => rw [reverse.map_mul, mul_comm, hx₁, hx₂] \| add x₁ x₂ hx₁ hx₂ => rw [reverse.map_add, hx₁, hx₂] @[simp] theorem reverse_eq_id : (reverse : CliffordAlgebra Q →ₗ[ℝ] _) = LinearMap.id := LinearMap.ext reverse_apply /-- `Complex.conj` is analogous to `CliffordAlgebra.involute`. -/ @[simp] theorem ofComplex_conj (c : ℂ) : ofComplex (conj c) = involute (ofComplex c) := CliffordAlgebraComplex.equiv.injective <\| by rw [equiv_apply, equiv_apply, toComplex_involute, toComplex_ofComplex, toComplex_ofComplex] end CliffordAlgebraComplex /-! ### The clifford algebra isomorphic to the quaternions -/ namespace CliffordAlgebraQuaternion open scoped Quaternion open QuaternionAlgebra variable {R : Type} [CommRing R] (c₁ c₂ : R) /-- `Q c₁ c₂` is a quadratic form over `R × R` such that `CliffordAlgebra (Q c₁ c₂)` is isomorphic as an `R`-algebra to `ℍ[R,c₁,c₂]`. -/ def Q : QuadraticForm R (R × R) := (c₁ • QuadraticMap.sq).prod (c₂ • QuadraticMap.sq) @[simp] theorem Q_apply (v : R × R) : Q c₁ c₂ v = c₁ (v.1 * v.1) + c₂ * (v.2 * v.2) := rfl /-- The quaternion basis vectors within the algebra. -/ @[simps i j k] def quaternionBasis : QuaternionAlgebra.Basis (CliffordAlgebra (Q c₁ c₂)) c₁ 0 c₂ where i := ι (Q c₁ c₂) (1, 0) j := ι (Q c₁ c₂) (0, 1) k := ι (Q c₁ c₂) (1, 0) * ι (Q c₁ c₂) (0, 1) i_mul_i := by rw [ι_sq_scalar, Q_apply, ← Algebra.algebraMap_eq_smul_one] simp j_mul_j := by rw [ι_sq_scalar, Q_apply, ← Algebra.algebraMap_eq_smul_one] simp i_mul_j := rfl j_mul_i := by rw [zero_smul, zero_sub, eq_neg_iff_add_eq_zero, ι_mul_ι_add_swap, QuadraticMap.polar] simp variable {c₁ c₂} /-- Intermediate result of `CliffordAlgebraQuaternion.equiv`: clifford algebras over `CliffordAlgebraQuaternion.Q` can be converted to `ℍ[R,c₁,c₂]`. -/ def toQuaternion : CliffordAlgebra (Q c₁ c₂) →ₐ[R] ℍ[R,c₁,0,c₂] := CliffordAlgebra.lift (Q c₁ c₂) ⟨{ toFun := fun v => (⟨0, v.1, v.2, 0⟩ : ℍ[R,c₁,0,c₂]) map_add' := fun v₁ v₂ => by simp map_smul' := fun r v => by dsimp; rw [mul_zero] }, fun v => by dsimp ext all_goals dsimp; ring⟩ @[simp] theorem toQuaternion_ι (v : R × R) : toQuaternion (ι (Q c₁ c₂) v) = (⟨0, v.1, v.2, 0⟩ : ℍ[R,c₁,0,c₂]) := CliffordAlgebra.lift_ι_apply _ _ v /-- The "clifford conjugate" maps to the quaternion conjugate. -/ theorem toQuaternion_star (c : CliffordAlgebra (Q c₁ c₂)) : toQuaternion (star c) = star (toQuaternion c) := by simp only [CliffordAlgebra.star_def'] induction c using CliffordAlgebra.induction with \| algebraMap r => simp \| ι x => simp \| mul x₁ x₂ hx₁ hx₂ => simp [hx₁, hx₂] \| add x₁ x₂ hx₁ hx₂ => simp [hx₁, hx₂] /-- Map a quaternion into the clifford algebra. -/ def ofQuaternion : ℍ[R,c₁,0,c₂] →ₐ[R] CliffordAlgebra (Q c₁ c₂) := (quaternionBasis c₁ c₂).liftHom @[simp] theorem ofQuaternion_mk (a₁ a₂ a₃ a₄ : R) : ofQuaternion (⟨a₁, a₂, a₃, a₄⟩ : ℍ[R,c₁,0,c₂]) = algebraMap R _ a₁ + a₂ • ι (Q c₁ c₂) (1, 0) + a₃ • ι (Q c₁ c₂) (0, 1) + a₄ • (ι (Q c₁ c₂) (1, 0) * ι (Q c₁ c₂) (0, 1)) := rfl @[simp] theorem ofQuaternion_comp_toQuaternion : ofQuaternion.comp toQuaternion = AlgHom.id R (CliffordAlgebra (Q c₁ c₂)) := by ext : 1 dsimp -- before we end up with two goals and have to do this twice ext all_goals dsimp rw [toQuaternion_ι] dsimp simp only [toQuaternion_ι, zero_smul, one_smul, zero_add, add_zero, RingHom.map_zero] @[simp] theorem ofQuaternion_toQuaternion (c : CliffordAlgebra (Q c₁ c₂)) : ofQuaternion (toQuaternion c) = c := AlgHom.congr_fun ofQuaternion_comp_toQuaternion c	@[simp] theorem toQuaternion_comp_ofQuaternion : toQuaternion.comp ofQuaternion = AlgHom.id R ℍ[R,c₁,0,c₂] := by ext : 1 <;> simp @[simp] theorem toQuaternion_ofQuaternion (q : ℍ[R,c₁,0,c₂]) : toQuaternion (ofQuaternion q) = q := AlgHom.congr_fun toQuaternion_comp_ofQuaternion q /-- The clifford algebra over `CliffordAlgebraQuaternion.Q c₁ c₂` is isomorphic as an `R`-algebra to `ℍ[R,c₁,c₂]`. -/ @[simps!]	Mathlib/LinearAlgebra/CliffordAlgebra/Equivs.lean	311	322
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Jeremy Avigad -/ import Mathlib.Algebra.Group.Basic import Mathlib.Algebra.Notation.Pi import Mathlib.Data.Set.Lattice import Mathlib.Order.Filter.Defs /-! # Theory of filters on sets A filter on a type `α` is a collection of sets of `α` which contains the whole `α`, is upwards-closed, and is stable under intersection. They are mostly used to abstract two related kinds of ideas: * limits, including finite or infinite limits of sequences, finite or infinite limits of functions at a point or at infinity, etc... * things happening eventually, including things happening for large enough `n : ℕ`, or near enough a point `x`, or for close enough pairs of points, or things happening almost everywhere in the sense of measure theory. Dually, filters can also express the idea of things happening often: for arbitrarily large `n`, or at a point in any neighborhood of given a point etc... ## Main definitions In this file, we endow `Filter α` it with a complete lattice structure. This structure is lifted from the lattice structure on `Set (Set X)` using the Galois insertion which maps a filter to its elements in one direction, and an arbitrary set of sets to the smallest filter containing it in the other direction. We also prove `Filter` is a monadic functor, with a push-forward operation `Filter.map` and a pull-back operation `Filter.comap` that form a Galois connections for the order on filters. The examples of filters appearing in the description of the two motivating ideas are: * `(Filter.atTop : Filter ℕ)` : made of sets of `ℕ` containing `{n \| n ≥ N}` for some `N` * `𝓝 x` : made of neighborhoods of `x` in a topological space (defined in topology.basic) * `𝓤 X` : made of entourages of a uniform space (those space are generalizations of metric spaces defined in `Mathlib/Topology/UniformSpace/Basic.lean`) * `MeasureTheory.ae` : made of sets whose complement has zero measure with respect to `μ` (defined in `Mathlib/MeasureTheory/OuterMeasure/AE`) The predicate "happening eventually" is `Filter.Eventually`, and "happening often" is `Filter.Frequently`, whose definitions are immediate after `Filter` is defined (but they come rather late in this file in order to immediately relate them to the lattice structure). ## Notations * `∀ᶠ x in f, p x` : `f.Eventually p`; * `∃ᶠ x in f, p x` : `f.Frequently p`; * `f =ᶠ[l] g` : `∀ᶠ x in l, f x = g x`; * `f ≤ᶠ[l] g` : `∀ᶠ x in l, f x ≤ g x`; * `𝓟 s` : `Filter.Principal s`, localized in `Filter`. ## References * [N. Bourbaki, General Topology][bourbaki1966] Important note: Bourbaki requires that a filter on `X` cannot contain all sets of `X`, which we do not require. This gives `Filter X` better formal properties, in particular a bottom element `⊥` for its lattice structure, at the cost of including the assumption `[NeBot f]` in a number of lemmas and definitions. -/ assert_not_exists OrderedSemiring Fintype open Function Set Order open scoped symmDiff universe u v w x y namespace Filter variable {α : Type u} {f g : Filter α} {s t : Set α} instance inhabitedMem : Inhabited { s : Set α // s ∈ f } := ⟨⟨univ, f.univ_sets⟩⟩ theorem filter_eq_iff : f = g ↔ f.sets = g.sets := ⟨congr_arg _, filter_eq⟩ @[simp] theorem sets_subset_sets : f.sets ⊆ g.sets ↔ g ≤ f := .rfl @[simp] theorem sets_ssubset_sets : f.sets ⊂ g.sets ↔ g < f := .rfl /-- An extensionality lemma that is useful for filters with good lemmas about `sᶜ ∈ f` (e.g., `Filter.comap`, `Filter.coprod`, `Filter.Coprod`, `Filter.cofinite`). -/ protected theorem coext (h : ∀ s, sᶜ ∈ f ↔ sᶜ ∈ g) : f = g := Filter.ext <\| compl_surjective.forall.2 h instance : Trans (· ⊇ ·) ((· ∈ ·) : Set α → Filter α → Prop) (· ∈ ·) where trans h₁ h₂ := mem_of_superset h₂ h₁ instance : Trans Membership.mem (· ⊆ ·) (Membership.mem : Filter α → Set α → Prop) where trans h₁ h₂ := mem_of_superset h₁ h₂ @[simp] theorem inter_mem_iff {s t : Set α} : s ∩ t ∈ f ↔ s ∈ f ∧ t ∈ f := ⟨fun h => ⟨mem_of_superset h inter_subset_left, mem_of_superset h inter_subset_right⟩, and_imp.2 inter_mem⟩ theorem diff_mem {s t : Set α} (hs : s ∈ f) (ht : tᶜ ∈ f) : s \ t ∈ f := inter_mem hs ht theorem congr_sets (h : { x \| x ∈ s ↔ x ∈ t } ∈ f) : s ∈ f ↔ t ∈ f := ⟨fun hs => mp_mem hs (mem_of_superset h fun _ => Iff.mp), fun hs => mp_mem hs (mem_of_superset h fun _ => Iff.mpr)⟩ lemma copy_eq {S} (hmem : ∀ s, s ∈ S ↔ s ∈ f) : f.copy S hmem = f := Filter.ext hmem /-- Weaker version of `Filter.biInter_mem` that assumes `Subsingleton β` rather than `Finite β`. -/ theorem biInter_mem' {β : Type v} {s : β → Set α} {is : Set β} (hf : is.Subsingleton) : (⋂ i ∈ is, s i) ∈ f ↔ ∀ i ∈ is, s i ∈ f := by apply Subsingleton.induction_on hf <;> simp /-- Weaker version of `Filter.iInter_mem` that assumes `Subsingleton β` rather than `Finite β`. -/ theorem iInter_mem' {β : Sort v} {s : β → Set α} [Subsingleton β] : (⋂ i, s i) ∈ f ↔ ∀ i, s i ∈ f := by rw [← sInter_range, sInter_eq_biInter, biInter_mem' (subsingleton_range s), forall_mem_range] theorem exists_mem_subset_iff : (∃ t ∈ f, t ⊆ s) ↔ s ∈ f := ⟨fun ⟨_, ht, ts⟩ => mem_of_superset ht ts, fun hs => ⟨s, hs, Subset.rfl⟩⟩ theorem monotone_mem {f : Filter α} : Monotone fun s => s ∈ f := fun _ _ hst h => mem_of_superset h hst theorem exists_mem_and_iff {P : Set α → Prop} {Q : Set α → Prop} (hP : Antitone P) (hQ : Antitone Q) : ((∃ u ∈ f, P u) ∧ ∃ u ∈ f, Q u) ↔ ∃ u ∈ f, P u ∧ Q u := by constructor · rintro ⟨⟨u, huf, hPu⟩, v, hvf, hQv⟩ exact ⟨u ∩ v, inter_mem huf hvf, hP inter_subset_left hPu, hQ inter_subset_right hQv⟩ · rintro ⟨u, huf, hPu, hQu⟩ exact ⟨⟨u, huf, hPu⟩, u, huf, hQu⟩ theorem forall_in_swap {β : Type} {p : Set α → β → Prop} : (∀ a ∈ f, ∀ (b), p a b) ↔ ∀ (b), ∀ a ∈ f, p a b := Set.forall_in_swap end Filter namespace Filter variable {α : Type u} {β : Type v} {γ : Type w} {δ : Type} {ι : Sort x} theorem mem_principal_self (s : Set α) : s ∈ 𝓟 s := Subset.rfl section Lattice variable {f g : Filter α} {s t : Set α} protected theorem not_le : ¬f ≤ g ↔ ∃ s ∈ g, s ∉ f := by simp_rw [le_def, not_forall, exists_prop] /-- `GenerateSets g s`: `s` is in the filter closure of `g`. -/ inductive GenerateSets (g : Set (Set α)) : Set α → Prop \| basic {s : Set α} : s ∈ g → GenerateSets g s \| univ : GenerateSets g univ \| superset {s t : Set α} : GenerateSets g s → s ⊆ t → GenerateSets g t \| inter {s t : Set α} : GenerateSets g s → GenerateSets g t → GenerateSets g (s ∩ t) /-- `generate g` is the largest filter containing the sets `g`. -/ def generate (g : Set (Set α)) : Filter α where sets := {s \| GenerateSets g s} univ_sets := GenerateSets.univ sets_of_superset := GenerateSets.superset inter_sets := GenerateSets.inter lemma mem_generate_of_mem {s : Set <\| Set α} {U : Set α} (h : U ∈ s) : U ∈ generate s := GenerateSets.basic h theorem le_generate_iff {s : Set (Set α)} {f : Filter α} : f ≤ generate s ↔ s ⊆ f.sets := Iff.intro (fun h _ hu => h <\| GenerateSets.basic <\| hu) fun h _ hu => hu.recOn (fun h' => h h') univ_mem (fun _ hxy hx => mem_of_superset hx hxy) fun _ _ hx hy => inter_mem hx hy @[simp] lemma generate_singleton (s : Set α) : generate {s} = 𝓟 s := le_antisymm (fun _t ht ↦ mem_of_superset (mem_generate_of_mem <\| mem_singleton _) ht) <\| le_generate_iff.2 <\| singleton_subset_iff.2 Subset.rfl /-- `mkOfClosure s hs` constructs a filter on `α` whose elements set is exactly `s : Set (Set α)`, provided one gives the assumption `hs : (generate s).sets = s`. -/ protected def mkOfClosure (s : Set (Set α)) (hs : (generate s).sets = s) : Filter α where sets := s univ_sets := hs ▸ univ_mem sets_of_superset := hs ▸ mem_of_superset inter_sets := hs ▸ inter_mem theorem mkOfClosure_sets {s : Set (Set α)} {hs : (generate s).sets = s} : Filter.mkOfClosure s hs = generate s := Filter.ext fun u => show u ∈ (Filter.mkOfClosure s hs).sets ↔ u ∈ (generate s).sets from hs.symm ▸ Iff.rfl /-- Galois insertion from sets of sets into filters. -/ def giGenerate (α : Type) : @GaloisInsertion (Set (Set α)) (Filter α)ᵒᵈ _ _ Filter.generate Filter.sets where gc _ _ := le_generate_iff le_l_u _ _ h := GenerateSets.basic h choice s hs := Filter.mkOfClosure s (le_antisymm hs <\| le_generate_iff.1 <\| le_rfl) choice_eq _ _ := mkOfClosure_sets theorem mem_inf_iff {f g : Filter α} {s : Set α} : s ∈ f ⊓ g ↔ ∃ t₁ ∈ f, ∃ t₂ ∈ g, s = t₁ ∩ t₂ := Iff.rfl theorem mem_inf_of_left {f g : Filter α} {s : Set α} (h : s ∈ f) : s ∈ f ⊓ g := ⟨s, h, univ, univ_mem, (inter_univ s).symm⟩ theorem mem_inf_of_right {f g : Filter α} {s : Set α} (h : s ∈ g) : s ∈ f ⊓ g := ⟨univ, univ_mem, s, h, (univ_inter s).symm⟩ theorem inter_mem_inf {α : Type u} {f g : Filter α} {s t : Set α} (hs : s ∈ f) (ht : t ∈ g) : s ∩ t ∈ f ⊓ g := ⟨s, hs, t, ht, rfl⟩ theorem mem_inf_of_inter {f g : Filter α} {s t u : Set α} (hs : s ∈ f) (ht : t ∈ g) (h : s ∩ t ⊆ u) : u ∈ f ⊓ g := mem_of_superset (inter_mem_inf hs ht) h theorem mem_inf_iff_superset {f g : Filter α} {s : Set α} : s ∈ f ⊓ g ↔ ∃ t₁ ∈ f, ∃ t₂ ∈ g, t₁ ∩ t₂ ⊆ s := ⟨fun ⟨t₁, h₁, t₂, h₂, Eq⟩ => ⟨t₁, h₁, t₂, h₂, Eq ▸ Subset.rfl⟩, fun ⟨_, h₁, _, h₂, sub⟩ => mem_inf_of_inter h₁ h₂ sub⟩ section CompleteLattice /-- Complete lattice structure on `Filter α`. -/ instance instCompleteLatticeFilter : CompleteLattice (Filter α) where inf a b := min a b sup a b := max a b le_sup_left _ _ _ h := h.1 le_sup_right _ _ _ h := h.2 sup_le _ _ _ h₁ h₂ _ h := ⟨h₁ h, h₂ h⟩ inf_le_left _ _ _ := mem_inf_of_left inf_le_right _ _ _ := mem_inf_of_right le_inf := fun _ _ _ h₁ h₂ _s ⟨_a, ha, _b, hb, hs⟩ => hs.symm ▸ inter_mem (h₁ ha) (h₂ hb) le_sSup _ _ h₁ _ h₂ := h₂ h₁ sSup_le _ _ h₁ _ h₂ _ h₃ := h₁ _ h₃ h₂ sInf_le _ _ h₁ _ h₂ := by rw [← Filter.sSup_lowerBounds]; exact fun _ h₃ ↦ h₃ h₁ h₂ le_sInf _ _ h₁ _ h₂ := by rw [← Filter.sSup_lowerBounds] at h₂; exact h₂ h₁ le_top _ _ := univ_mem' bot_le _ _ _ := trivial instance : Inhabited (Filter α) := ⟨⊥⟩ end CompleteLattice theorem NeBot.ne {f : Filter α} (hf : NeBot f) : f ≠ ⊥ := hf.ne' @[simp] theorem not_neBot {f : Filter α} : ¬f.NeBot ↔ f = ⊥ := neBot_iff.not_left theorem NeBot.mono {f g : Filter α} (hf : NeBot f) (hg : f ≤ g) : NeBot g := ⟨ne_bot_of_le_ne_bot hf.1 hg⟩ theorem neBot_of_le {f g : Filter α} [hf : NeBot f] (hg : f ≤ g) : NeBot g := hf.mono hg @[simp] theorem sup_neBot {f g : Filter α} : NeBot (f ⊔ g) ↔ NeBot f ∨ NeBot g := by simp only [neBot_iff, not_and_or, Ne, sup_eq_bot_iff] theorem not_disjoint_self_iff : ¬Disjoint f f ↔ f.NeBot := by rw [disjoint_self, neBot_iff] theorem bot_sets_eq : (⊥ : Filter α).sets = univ := rfl /-- Either `f = ⊥` or `Filter.NeBot f`. This is a version of `eq_or_ne` that uses `Filter.NeBot` as the second alternative, to be used as an instance. -/ theorem eq_or_neBot (f : Filter α) : f = ⊥ ∨ NeBot f := (eq_or_ne f ⊥).imp_right NeBot.mk theorem sup_sets_eq {f g : Filter α} : (f ⊔ g).sets = f.sets ∩ g.sets := (giGenerate α).gc.u_inf theorem sSup_sets_eq {s : Set (Filter α)} : (sSup s).sets = ⋂ f ∈ s, (f : Filter α).sets := (giGenerate α).gc.u_sInf theorem iSup_sets_eq {f : ι → Filter α} : (iSup f).sets = ⋂ i, (f i).sets := (giGenerate α).gc.u_iInf theorem generate_empty : Filter.generate ∅ = (⊤ : Filter α) := (giGenerate α).gc.l_bot theorem generate_univ : Filter.generate univ = (⊥ : Filter α) := bot_unique fun _ _ => GenerateSets.basic (mem_univ _) theorem generate_union {s t : Set (Set α)} : Filter.generate (s ∪ t) = Filter.generate s ⊓ Filter.generate t := (giGenerate α).gc.l_sup theorem generate_iUnion {s : ι → Set (Set α)} : Filter.generate (⋃ i, s i) = ⨅ i, Filter.generate (s i) := (giGenerate α).gc.l_iSup @[simp] theorem mem_sup {f g : Filter α} {s : Set α} : s ∈ f ⊔ g ↔ s ∈ f ∧ s ∈ g := Iff.rfl theorem union_mem_sup {f g : Filter α} {s t : Set α} (hs : s ∈ f) (ht : t ∈ g) : s ∪ t ∈ f ⊔ g := ⟨mem_of_superset hs subset_union_left, mem_of_superset ht subset_union_right⟩ @[simp] theorem mem_iSup {x : Set α} {f : ι → Filter α} : x ∈ iSup f ↔ ∀ i, x ∈ f i := by simp only [← Filter.mem_sets, iSup_sets_eq, mem_iInter] @[simp] theorem iSup_neBot {f : ι → Filter α} : (⨆ i, f i).NeBot ↔ ∃ i, (f i).NeBot := by simp [neBot_iff] theorem iInf_eq_generate (s : ι → Filter α) : iInf s = generate (⋃ i, (s i).sets) := eq_of_forall_le_iff fun _ ↦ by simp [le_generate_iff] theorem mem_iInf_of_mem {f : ι → Filter α} (i : ι) {s} (hs : s ∈ f i) : s ∈ ⨅ i, f i := iInf_le f i hs @[simp] theorem le_principal_iff {s : Set α} {f : Filter α} : f ≤ 𝓟 s ↔ s ∈ f := ⟨fun h => h Subset.rfl, fun hs _ ht => mem_of_superset hs ht⟩ theorem Iic_principal (s : Set α) : Iic (𝓟 s) = { l \| s ∈ l } := Set.ext fun _ => le_principal_iff theorem principal_mono {s t : Set α} : 𝓟 s ≤ 𝓟 t ↔ s ⊆ t := by simp only [le_principal_iff, mem_principal] @[gcongr] alias ⟨_, _root_.GCongr.filter_principal_mono⟩ := principal_mono @[mono] theorem monotone_principal : Monotone (𝓟 : Set α → Filter α) := fun _ _ => principal_mono.2 @[simp] theorem principal_eq_iff_eq {s t : Set α} : 𝓟 s = 𝓟 t ↔ s = t := by simp only [le_antisymm_iff, le_principal_iff, mem_principal]; rfl @[simp] theorem join_principal_eq_sSup {s : Set (Filter α)} : join (𝓟 s) = sSup s := rfl @[simp] theorem principal_univ : 𝓟 (univ : Set α) = ⊤ := top_unique <\| by simp only [le_principal_iff, mem_top, eq_self_iff_true] @[simp] theorem principal_empty : 𝓟 (∅ : Set α) = ⊥ := bot_unique fun _ _ => empty_subset _ theorem generate_eq_biInf (S : Set (Set α)) : generate S = ⨅ s ∈ S, 𝓟 s := eq_of_forall_le_iff fun f => by simp [le_generate_iff, le_principal_iff, subset_def] /-! ### Lattice equations -/ theorem empty_mem_iff_bot {f : Filter α} : ∅ ∈ f ↔ f = ⊥ := ⟨fun h => bot_unique fun s _ => mem_of_superset h (empty_subset s), fun h => h.symm ▸ mem_bot⟩ theorem nonempty_of_mem {f : Filter α} [hf : NeBot f] {s : Set α} (hs : s ∈ f) : s.Nonempty := s.eq_empty_or_nonempty.elim (fun h => absurd hs (h.symm ▸ mt empty_mem_iff_bot.mp hf.1)) id theorem NeBot.nonempty_of_mem {f : Filter α} (hf : NeBot f) {s : Set α} (hs : s ∈ f) : s.Nonempty := @Filter.nonempty_of_mem α f hf s hs @[simp] theorem empty_not_mem (f : Filter α) [NeBot f] : ¬∅ ∈ f := fun h => (nonempty_of_mem h).ne_empty rfl theorem nonempty_of_neBot (f : Filter α) [NeBot f] : Nonempty α := nonempty_of_exists <\| nonempty_of_mem (univ_mem : univ ∈ f) theorem compl_not_mem {f : Filter α} {s : Set α} [NeBot f] (h : s ∈ f) : sᶜ ∉ f := fun hsc => (nonempty_of_mem (inter_mem h hsc)).ne_empty <\| inter_compl_self s theorem filter_eq_bot_of_isEmpty [IsEmpty α] (f : Filter α) : f = ⊥ := empty_mem_iff_bot.mp <\| univ_mem' isEmptyElim protected lemma disjoint_iff {f g : Filter α} : Disjoint f g ↔ ∃ s ∈ f, ∃ t ∈ g, Disjoint s t := by simp only [disjoint_iff, ← empty_mem_iff_bot, mem_inf_iff, inf_eq_inter, bot_eq_empty, @eq_comm _ ∅] theorem disjoint_of_disjoint_of_mem {f g : Filter α} {s t : Set α} (h : Disjoint s t) (hs : s ∈ f) (ht : t ∈ g) : Disjoint f g := Filter.disjoint_iff.mpr ⟨s, hs, t, ht, h⟩ theorem NeBot.not_disjoint (hf : f.NeBot) (hs : s ∈ f) (ht : t ∈ f) : ¬Disjoint s t := fun h => not_disjoint_self_iff.2 hf <\| Filter.disjoint_iff.2 ⟨s, hs, t, ht, h⟩ theorem inf_eq_bot_iff {f g : Filter α} : f ⊓ g = ⊥ ↔ ∃ U ∈ f, ∃ V ∈ g, U ∩ V = ∅ := by simp only [← disjoint_iff, Filter.disjoint_iff, Set.disjoint_iff_inter_eq_empty] /-- There is exactly one filter on an empty type. -/ instance unique [IsEmpty α] : Unique (Filter α) where default := ⊥ uniq := filter_eq_bot_of_isEmpty theorem NeBot.nonempty (f : Filter α) [hf : f.NeBot] : Nonempty α := not_isEmpty_iff.mp fun _ ↦ hf.ne (Subsingleton.elim _ _) /-- There are only two filters on a `Subsingleton`: `⊥` and `⊤`. If the type is empty, then they are equal. -/ theorem eq_top_of_neBot [Subsingleton α] (l : Filter α) [NeBot l] : l = ⊤ := by refine top_unique fun s hs => ?_ obtain rfl : s = univ := Subsingleton.eq_univ_of_nonempty (nonempty_of_mem hs) exact univ_mem theorem forall_mem_nonempty_iff_neBot {f : Filter α} : (∀ s : Set α, s ∈ f → s.Nonempty) ↔ NeBot f := ⟨fun h => ⟨fun hf => not_nonempty_empty (h ∅ <\| hf.symm ▸ mem_bot)⟩, @nonempty_of_mem _ _⟩ instance instNeBotTop [Nonempty α] : NeBot (⊤ : Filter α) := forall_mem_nonempty_iff_neBot.1 fun s hs => by rwa [mem_top.1 hs, ← nonempty_iff_univ_nonempty] instance instNontrivialFilter [Nonempty α] : Nontrivial (Filter α) := ⟨⟨⊤, ⊥, instNeBotTop.ne⟩⟩ theorem nontrivial_iff_nonempty : Nontrivial (Filter α) ↔ Nonempty α := ⟨fun _ => by_contra fun h' => haveI := not_nonempty_iff.1 h' not_subsingleton (Filter α) inferInstance, @Filter.instNontrivialFilter α⟩ theorem eq_sInf_of_mem_iff_exists_mem {S : Set (Filter α)} {l : Filter α} (h : ∀ {s}, s ∈ l ↔ ∃ f ∈ S, s ∈ f) : l = sInf S := le_antisymm (le_sInf fun f hf _ hs => h.2 ⟨f, hf, hs⟩) fun _ hs => let ⟨_, hf, hs⟩ := h.1 hs; (sInf_le hf) hs theorem eq_iInf_of_mem_iff_exists_mem {f : ι → Filter α} {l : Filter α} (h : ∀ {s}, s ∈ l ↔ ∃ i, s ∈ f i) : l = iInf f := eq_sInf_of_mem_iff_exists_mem <\| h.trans (exists_range_iff (p := (_ ∈ ·))).symm theorem eq_biInf_of_mem_iff_exists_mem {f : ι → Filter α} {p : ι → Prop} {l : Filter α} (h : ∀ {s}, s ∈ l ↔ ∃ i, p i ∧ s ∈ f i) : l = ⨅ (i) (_ : p i), f i := by rw [iInf_subtype'] exact eq_iInf_of_mem_iff_exists_mem fun {_} => by simp only [Subtype.exists, h, exists_prop] theorem iInf_sets_eq {f : ι → Filter α} (h : Directed (· ≥ ·) f) [ne : Nonempty ι] : (iInf f).sets = ⋃ i, (f i).sets := let ⟨i⟩ := ne let u := { sets := ⋃ i, (f i).sets univ_sets := mem_iUnion.2 ⟨i, univ_mem⟩ sets_of_superset := by simp only [mem_iUnion, exists_imp] exact fun i hx hxy => ⟨i, mem_of_superset hx hxy⟩ inter_sets := by simp only [mem_iUnion, exists_imp] intro x y a hx b hy rcases h a b with ⟨c, ha, hb⟩ exact ⟨c, inter_mem (ha hx) (hb hy)⟩ } have : u = iInf f := eq_iInf_of_mem_iff_exists_mem mem_iUnion congr_arg Filter.sets this.symm theorem mem_iInf_of_directed {f : ι → Filter α} (h : Directed (· ≥ ·) f) [Nonempty ι] (s) : s ∈ iInf f ↔ ∃ i, s ∈ f i := by simp only [← Filter.mem_sets, iInf_sets_eq h, mem_iUnion] theorem mem_biInf_of_directed {f : β → Filter α} {s : Set β} (h : DirectedOn (f ⁻¹'o (· ≥ ·)) s) (ne : s.Nonempty) {t : Set α} : (t ∈ ⨅ i ∈ s, f i) ↔ ∃ i ∈ s, t ∈ f i := by haveI := ne.to_subtype simp_rw [iInf_subtype', mem_iInf_of_directed h.directed_val, Subtype.exists, exists_prop] theorem biInf_sets_eq {f : β → Filter α} {s : Set β} (h : DirectedOn (f ⁻¹'o (· ≥ ·)) s) (ne : s.Nonempty) : (⨅ i ∈ s, f i).sets = ⋃ i ∈ s, (f i).sets := ext fun t => by simp [mem_biInf_of_directed h ne] @[simp] theorem sup_join {f₁ f₂ : Filter (Filter α)} : join f₁ ⊔ join f₂ = join (f₁ ⊔ f₂) := Filter.ext fun x => by simp only [mem_sup, mem_join] @[simp] theorem iSup_join {ι : Sort w} {f : ι → Filter (Filter α)} : ⨆ x, join (f x) = join (⨆ x, f x) := Filter.ext fun x => by simp only [mem_iSup, mem_join] instance : DistribLattice (Filter α) := { Filter.instCompleteLatticeFilter with le_sup_inf := by intro x y z s simp only [and_assoc, mem_inf_iff, mem_sup, exists_prop, exists_imp, and_imp] rintro hs t₁ ht₁ t₂ ht₂ rfl exact ⟨t₁, x.sets_of_superset hs inter_subset_left, ht₁, t₂, x.sets_of_superset hs inter_subset_right, ht₂, rfl⟩ } /-- If `f : ι → Filter α` is directed, `ι` is not empty, and `∀ i, f i ≠ ⊥`, then `iInf f ≠ ⊥`. See also `iInf_neBot_of_directed` for a version assuming `Nonempty α` instead of `Nonempty ι`. -/ theorem iInf_neBot_of_directed' {f : ι → Filter α} [Nonempty ι] (hd : Directed (· ≥ ·) f) : (∀ i, NeBot (f i)) → NeBot (iInf f) := not_imp_not.1 <\| by simpa only [not_forall, not_neBot, ← empty_mem_iff_bot, mem_iInf_of_directed hd] using id /-- If `f : ι → Filter α` is directed, `α` is not empty, and `∀ i, f i ≠ ⊥`, then `iInf f ≠ ⊥`. See also `iInf_neBot_of_directed'` for a version assuming `Nonempty ι` instead of `Nonempty α`. -/ theorem iInf_neBot_of_directed {f : ι → Filter α} [hn : Nonempty α] (hd : Directed (· ≥ ·) f) (hb : ∀ i, NeBot (f i)) : NeBot (iInf f) := by cases isEmpty_or_nonempty ι · constructor simp [iInf_of_empty f, top_ne_bot] · exact iInf_neBot_of_directed' hd hb theorem sInf_neBot_of_directed' {s : Set (Filter α)} (hne : s.Nonempty) (hd : DirectedOn (· ≥ ·) s) (hbot : ⊥ ∉ s) : NeBot (sInf s) := (sInf_eq_iInf' s).symm ▸ @iInf_neBot_of_directed' _ _ _ hne.to_subtype hd.directed_val fun ⟨_, hf⟩ => ⟨ne_of_mem_of_not_mem hf hbot⟩ theorem sInf_neBot_of_directed [Nonempty α] {s : Set (Filter α)} (hd : DirectedOn (· ≥ ·) s) (hbot : ⊥ ∉ s) : NeBot (sInf s) := (sInf_eq_iInf' s).symm ▸ iInf_neBot_of_directed hd.directed_val fun ⟨_, hf⟩ => ⟨ne_of_mem_of_not_mem hf hbot⟩ theorem iInf_neBot_iff_of_directed' {f : ι → Filter α} [Nonempty ι] (hd : Directed (· ≥ ·) f) : NeBot (iInf f) ↔ ∀ i, NeBot (f i) := ⟨fun H i => H.mono (iInf_le _ i), iInf_neBot_of_directed' hd⟩ theorem iInf_neBot_iff_of_directed {f : ι → Filter α} [Nonempty α] (hd : Directed (· ≥ ·) f) : NeBot (iInf f) ↔ ∀ i, NeBot (f i) := ⟨fun H i => H.mono (iInf_le _ i), iInf_neBot_of_directed hd⟩ /-! #### `principal` equations -/ @[simp] theorem inf_principal {s t : Set α} : 𝓟 s ⊓ 𝓟 t = 𝓟 (s ∩ t) := le_antisymm (by simp only [le_principal_iff, mem_inf_iff]; exact ⟨s, Subset.rfl, t, Subset.rfl, rfl⟩) (by simp [le_inf_iff, inter_subset_left, inter_subset_right]) @[simp] theorem sup_principal {s t : Set α} : 𝓟 s ⊔ 𝓟 t = 𝓟 (s ∪ t) := Filter.ext fun u => by simp only [union_subset_iff, mem_sup, mem_principal] @[simp] theorem iSup_principal {ι : Sort w} {s : ι → Set α} : ⨆ x, 𝓟 (s x) = 𝓟 (⋃ i, s i) := Filter.ext fun x => by simp only [mem_iSup, mem_principal, iUnion_subset_iff] @[simp] theorem principal_eq_bot_iff {s : Set α} : 𝓟 s = ⊥ ↔ s = ∅ := empty_mem_iff_bot.symm.trans <\| mem_principal.trans subset_empty_iff @[simp] theorem principal_neBot_iff {s : Set α} : NeBot (𝓟 s) ↔ s.Nonempty := neBot_iff.trans <\| (not_congr principal_eq_bot_iff).trans nonempty_iff_ne_empty.symm alias ⟨_, _root_.Set.Nonempty.principal_neBot⟩ := principal_neBot_iff theorem isCompl_principal (s : Set α) : IsCompl (𝓟 s) (𝓟 sᶜ) := IsCompl.of_eq (by rw [inf_principal, inter_compl_self, principal_empty]) <\| by rw [sup_principal, union_compl_self, principal_univ] theorem mem_inf_principal' {f : Filter α} {s t : Set α} : s ∈ f ⊓ 𝓟 t ↔ tᶜ ∪ s ∈ f := by simp only [← le_principal_iff, (isCompl_principal s).le_left_iff, disjoint_assoc, inf_principal, ← (isCompl_principal (t ∩ sᶜ)).le_right_iff, compl_inter, compl_compl] lemma mem_inf_principal {f : Filter α} {s t : Set α} : s ∈ f ⊓ 𝓟 t ↔ { x \| x ∈ t → x ∈ s } ∈ f := by simp only [mem_inf_principal', imp_iff_not_or, setOf_or, compl_def, setOf_mem_eq] lemma iSup_inf_principal (f : ι → Filter α) (s : Set α) : ⨆ i, f i ⊓ 𝓟 s = (⨆ i, f i) ⊓ 𝓟 s := by ext simp only [mem_iSup, mem_inf_principal] theorem inf_principal_eq_bot {f : Filter α} {s : Set α} : f ⊓ 𝓟 s = ⊥ ↔ sᶜ ∈ f := by rw [← empty_mem_iff_bot, mem_inf_principal] simp only [mem_empty_iff_false, imp_false, compl_def] theorem mem_of_eq_bot {f : Filter α} {s : Set α} (h : f ⊓ 𝓟 sᶜ = ⊥) : s ∈ f := by rwa [inf_principal_eq_bot, compl_compl] at h theorem diff_mem_inf_principal_compl {f : Filter α} {s : Set α} (hs : s ∈ f) (t : Set α) : s \ t ∈ f ⊓ 𝓟 tᶜ := inter_mem_inf hs <\| mem_principal_self tᶜ theorem principal_le_iff {s : Set α} {f : Filter α} : 𝓟 s ≤ f ↔ ∀ V ∈ f, s ⊆ V := by simp_rw [le_def, mem_principal] end Lattice @[mono, gcongr] theorem join_mono {f₁ f₂ : Filter (Filter α)} (h : f₁ ≤ f₂) : join f₁ ≤ join f₂ := fun _ hs => h hs /-! ### Eventually -/ theorem eventually_iff {f : Filter α} {P : α → Prop} : (∀ᶠ x in f, P x) ↔ { x \| P x } ∈ f := Iff.rfl @[simp] theorem eventually_mem_set {s : Set α} {l : Filter α} : (∀ᶠ x in l, x ∈ s) ↔ s ∈ l := Iff.rfl protected theorem ext' {f₁ f₂ : Filter α} (h : ∀ p : α → Prop, (∀ᶠ x in f₁, p x) ↔ ∀ᶠ x in f₂, p x) : f₁ = f₂ := Filter.ext h theorem Eventually.filter_mono {f₁ f₂ : Filter α} (h : f₁ ≤ f₂) {p : α → Prop} (hp : ∀ᶠ x in f₂, p x) : ∀ᶠ x in f₁, p x := h hp theorem eventually_of_mem {f : Filter α} {P : α → Prop} {U : Set α} (hU : U ∈ f) (h : ∀ x ∈ U, P x) : ∀ᶠ x in f, P x := mem_of_superset hU h protected theorem Eventually.and {p q : α → Prop} {f : Filter α} : f.Eventually p → f.Eventually q → ∀ᶠ x in f, p x ∧ q x := inter_mem @[simp] theorem eventually_true (f : Filter α) : ∀ᶠ _ in f, True := univ_mem theorem Eventually.of_forall {p : α → Prop} {f : Filter α} (hp : ∀ x, p x) : ∀ᶠ x in f, p x := univ_mem' hp @[simp] theorem eventually_false_iff_eq_bot {f : Filter α} : (∀ᶠ _ in f, False) ↔ f = ⊥ := empty_mem_iff_bot @[simp] theorem eventually_const {f : Filter α} [t : NeBot f] {p : Prop} : (∀ᶠ _ in f, p) ↔ p := by by_cases h : p <;> simp [h, t.ne] theorem eventually_iff_exists_mem {p : α → Prop} {f : Filter α} : (∀ᶠ x in f, p x) ↔ ∃ v ∈ f, ∀ y ∈ v, p y := exists_mem_subset_iff.symm theorem Eventually.exists_mem {p : α → Prop} {f : Filter α} (hp : ∀ᶠ x in f, p x) : ∃ v ∈ f, ∀ y ∈ v, p y := eventually_iff_exists_mem.1 hp theorem Eventually.mp {p q : α → Prop} {f : Filter α} (hp : ∀ᶠ x in f, p x) (hq : ∀ᶠ x in f, p x → q x) : ∀ᶠ x in f, q x := mp_mem hp hq theorem Eventually.mono {p q : α → Prop} {f : Filter α} (hp : ∀ᶠ x in f, p x) (hq : ∀ x, p x → q x) : ∀ᶠ x in f, q x := hp.mp (Eventually.of_forall hq) theorem forall_eventually_of_eventually_forall {f : Filter α} {p : α → β → Prop} (h : ∀ᶠ x in f, ∀ y, p x y) : ∀ y, ∀ᶠ x in f, p x y := fun y => h.mono fun _ h => h y @[simp] theorem eventually_and {p q : α → Prop} {f : Filter α} : (∀ᶠ x in f, p x ∧ q x) ↔ (∀ᶠ x in f, p x) ∧ ∀ᶠ x in f, q x := inter_mem_iff theorem Eventually.congr {f : Filter α} {p q : α → Prop} (h' : ∀ᶠ x in f, p x) (h : ∀ᶠ x in f, p x ↔ q x) : ∀ᶠ x in f, q x := h'.mp (h.mono fun _ hx => hx.mp) theorem eventually_congr {f : Filter α} {p q : α → Prop} (h : ∀ᶠ x in f, p x ↔ q x) : (∀ᶠ x in f, p x) ↔ ∀ᶠ x in f, q x := ⟨fun hp => hp.congr h, fun hq => hq.congr <\| by simpa only [Iff.comm] using h⟩ @[simp] theorem eventually_or_distrib_left {f : Filter α} {p : Prop} {q : α → Prop} : (∀ᶠ x in f, p ∨ q x) ↔ p ∨ ∀ᶠ x in f, q x := by_cases (fun h : p => by simp [h]) fun h => by simp [h] @[simp] theorem eventually_or_distrib_right {f : Filter α} {p : α → Prop} {q : Prop} : (∀ᶠ x in f, p x ∨ q) ↔ (∀ᶠ x in f, p x) ∨ q := by simp only [@or_comm _ q, eventually_or_distrib_left] theorem eventually_imp_distrib_left {f : Filter α} {p : Prop} {q : α → Prop} : (∀ᶠ x in f, p → q x) ↔ p → ∀ᶠ x in f, q x := by simp only [imp_iff_not_or, eventually_or_distrib_left] @[simp] theorem eventually_bot {p : α → Prop} : ∀ᶠ x in ⊥, p x := ⟨⟩ @[simp] theorem eventually_top {p : α → Prop} : (∀ᶠ x in ⊤, p x) ↔ ∀ x, p x := Iff.rfl @[simp] theorem eventually_sup {p : α → Prop} {f g : Filter α} : (∀ᶠ x in f ⊔ g, p x) ↔ (∀ᶠ x in f, p x) ∧ ∀ᶠ x in g, p x := Iff.rfl @[simp] theorem eventually_sSup {p : α → Prop} {fs : Set (Filter α)} : (∀ᶠ x in sSup fs, p x) ↔ ∀ f ∈ fs, ∀ᶠ x in f, p x := Iff.rfl @[simp] theorem eventually_iSup {p : α → Prop} {fs : ι → Filter α} : (∀ᶠ x in ⨆ b, fs b, p x) ↔ ∀ b, ∀ᶠ x in fs b, p x := mem_iSup @[simp] theorem eventually_principal {a : Set α} {p : α → Prop} : (∀ᶠ x in 𝓟 a, p x) ↔ ∀ x ∈ a, p x := Iff.rfl theorem Eventually.forall_mem {α : Type} {f : Filter α} {s : Set α} {P : α → Prop} (hP : ∀ᶠ x in f, P x) (hf : 𝓟 s ≤ f) : ∀ x ∈ s, P x := Filter.eventually_principal.mp (hP.filter_mono hf) theorem eventually_inf {f g : Filter α} {p : α → Prop} : (∀ᶠ x in f ⊓ g, p x) ↔ ∃ s ∈ f, ∃ t ∈ g, ∀ x ∈ s ∩ t, p x := mem_inf_iff_superset theorem eventually_inf_principal {f : Filter α} {p : α → Prop} {s : Set α} : (∀ᶠ x in f ⊓ 𝓟 s, p x) ↔ ∀ᶠ x in f, x ∈ s → p x := mem_inf_principal theorem eventually_iff_all_subsets {f : Filter α} {p : α → Prop} : (∀ᶠ x in f, p x) ↔ ∀ (s : Set α), ∀ᶠ x in f, x ∈ s → p x where mp h _ := by filter_upwards [h] with _ pa _ using pa mpr h := by filter_upwards [h univ] with _ pa using pa (by simp) /-! ### Frequently -/ theorem Eventually.frequently {f : Filter α} [NeBot f] {p : α → Prop} (h : ∀ᶠ x in f, p x) : ∃ᶠ x in f, p x := compl_not_mem h theorem Frequently.of_forall {f : Filter α} [NeBot f] {p : α → Prop} (h : ∀ x, p x) : ∃ᶠ x in f, p x := Eventually.frequently (Eventually.of_forall h) theorem Frequently.mp {p q : α → Prop} {f : Filter α} (h : ∃ᶠ x in f, p x) (hpq : ∀ᶠ x in f, p x → q x) : ∃ᶠ x in f, q x := mt (fun hq => hq.mp <\| hpq.mono fun _ => mt) h lemma frequently_congr {p q : α → Prop} {f : Filter α} (h : ∀ᶠ x in f, p x ↔ q x) : (∃ᶠ x in f, p x) ↔ ∃ᶠ x in f, q x := ⟨fun h' ↦ h'.mp (h.mono fun _ ↦ Iff.mp), fun h' ↦ h'.mp (h.mono fun _ ↦ Iff.mpr)⟩ theorem Frequently.filter_mono {p : α → Prop} {f g : Filter α} (h : ∃ᶠ x in f, p x) (hle : f ≤ g) : ∃ᶠ x in g, p x := mt (fun h' => h'.filter_mono hle) h theorem Frequently.mono {p q : α → Prop} {f : Filter α} (h : ∃ᶠ x in f, p x) (hpq : ∀ x, p x → q x) : ∃ᶠ x in f, q x := h.mp (Eventually.of_forall hpq) theorem Frequently.and_eventually {p q : α → Prop} {f : Filter α} (hp : ∃ᶠ x in f, p x) (hq : ∀ᶠ x in f, q x) : ∃ᶠ x in f, p x ∧ q x := by refine mt (fun h => hq.mp <\| h.mono ?_) hp exact fun x hpq hq hp => hpq ⟨hp, hq⟩ theorem Eventually.and_frequently {p q : α → Prop} {f : Filter α} (hp : ∀ᶠ x in f, p x) (hq : ∃ᶠ x in f, q x) : ∃ᶠ x in f, p x ∧ q x := by simpa only [and_comm] using hq.and_eventually hp theorem Frequently.exists {p : α → Prop} {f : Filter α} (hp : ∃ᶠ x in f, p x) : ∃ x, p x := by by_contra H replace H : ∀ᶠ x in f, ¬p x := Eventually.of_forall (not_exists.1 H) exact hp H theorem Eventually.exists {p : α → Prop} {f : Filter α} [NeBot f] (hp : ∀ᶠ x in f, p x) : ∃ x, p x := hp.frequently.exists lemma frequently_iff_neBot {l : Filter α} {p : α → Prop} : (∃ᶠ x in l, p x) ↔ NeBot (l ⊓ 𝓟 {x \| p x}) := by rw [neBot_iff, Ne, inf_principal_eq_bot]; rfl lemma frequently_mem_iff_neBot {l : Filter α} {s : Set α} : (∃ᶠ x in l, x ∈ s) ↔ NeBot (l ⊓ 𝓟 s) := frequently_iff_neBot theorem frequently_iff_forall_eventually_exists_and {p : α → Prop} {f : Filter α} : (∃ᶠ x in f, p x) ↔ ∀ {q : α → Prop}, (∀ᶠ x in f, q x) → ∃ x, p x ∧ q x := ⟨fun hp _ hq => (hp.and_eventually hq).exists, fun H hp => by simpa only [and_not_self_iff, exists_false] using H hp⟩ theorem frequently_iff {f : Filter α} {P : α → Prop} : (∃ᶠ x in f, P x) ↔ ∀ {U}, U ∈ f → ∃ x ∈ U, P x := by simp only [frequently_iff_forall_eventually_exists_and, @and_comm (P _)] rfl @[simp] theorem not_eventually {p : α → Prop} {f : Filter α} : (¬∀ᶠ x in f, p x) ↔ ∃ᶠ x in f, ¬p x := by simp [Filter.Frequently] @[simp] theorem not_frequently {p : α → Prop} {f : Filter α} : (¬∃ᶠ x in f, p x) ↔ ∀ᶠ x in f, ¬p x := by simp only [Filter.Frequently, not_not] @[simp] theorem frequently_true_iff_neBot (f : Filter α) : (∃ᶠ _ in f, True) ↔ NeBot f := by simp [frequently_iff_neBot] @[simp] theorem frequently_false (f : Filter α) : ¬∃ᶠ _ in f, False := by simp @[simp] theorem frequently_const {f : Filter α} [NeBot f] {p : Prop} : (∃ᶠ _ in f, p) ↔ p := by by_cases p <;> simp [] @[simp] theorem frequently_or_distrib {f : Filter α} {p q : α → Prop} : (∃ᶠ x in f, p x ∨ q x) ↔ (∃ᶠ x in f, p x) ∨ ∃ᶠ x in f, q x := by simp only [Filter.Frequently, ← not_and_or, not_or, eventually_and] theorem frequently_or_distrib_left {f : Filter α} [NeBot f] {p : Prop} {q : α → Prop} : (∃ᶠ x in f, p ∨ q x) ↔ p ∨ ∃ᶠ x in f, q x := by simp theorem frequently_or_distrib_right {f : Filter α} [NeBot f] {p : α → Prop} {q : Prop} : (∃ᶠ x in f, p x ∨ q) ↔ (∃ᶠ x in f, p x) ∨ q := by simp theorem frequently_imp_distrib {f : Filter α} {p q : α → Prop} : (∃ᶠ x in f, p x → q x) ↔ (∀ᶠ x in f, p x) → ∃ᶠ x in f, q x := by simp [imp_iff_not_or] theorem frequently_imp_distrib_left {f : Filter α} [NeBot f] {p : Prop} {q : α → Prop} : (∃ᶠ x in f, p → q x) ↔ p → ∃ᶠ x in f, q x := by simp [frequently_imp_distrib] theorem frequently_imp_distrib_right {f : Filter α} [NeBot f] {p : α → Prop} {q : Prop} : (∃ᶠ x in f, p x → q) ↔ (∀ᶠ x in f, p x) → q := by simp only [frequently_imp_distrib, frequently_const] theorem eventually_imp_distrib_right {f : Filter α} {p : α → Prop} {q : Prop} : (∀ᶠ x in f, p x → q) ↔ (∃ᶠ x in f, p x) → q := by simp only [imp_iff_not_or, eventually_or_distrib_right, not_frequently] @[simp] theorem frequently_and_distrib_left {f : Filter α} {p : Prop} {q : α → Prop} : (∃ᶠ x in f, p ∧ q x) ↔ p ∧ ∃ᶠ x in f, q x := by simp only [Filter.Frequently, not_and, eventually_imp_distrib_left, Classical.not_imp] @[simp] theorem frequently_and_distrib_right {f : Filter α} {p : α → Prop} {q : Prop} : (∃ᶠ x in f, p x ∧ q) ↔ (∃ᶠ x in f, p x) ∧ q := by simp only [@and_comm _ q, frequently_and_distrib_left] @[simp] theorem frequently_bot {p : α → Prop} : ¬∃ᶠ x in ⊥, p x := by simp @[simp] theorem frequently_top {p : α → Prop} : (∃ᶠ x in ⊤, p x) ↔ ∃ x, p x := by simp [Filter.Frequently] @[simp] theorem frequently_principal {a : Set α} {p : α → Prop} : (∃ᶠ x in 𝓟 a, p x) ↔ ∃ x ∈ a, p x := by simp [Filter.Frequently, not_forall] theorem frequently_inf_principal {f : Filter α} {s : Set α} {p : α → Prop} : (∃ᶠ x in f ⊓ 𝓟 s, p x) ↔ ∃ᶠ x in f, x ∈ s ∧ p x := by simp only [Filter.Frequently, eventually_inf_principal, not_and] alias ⟨Frequently.of_inf_principal, Frequently.inf_principal⟩ := frequently_inf_principal theorem frequently_sup {p : α → Prop} {f g : Filter α} : (∃ᶠ x in f ⊔ g, p x) ↔ (∃ᶠ x in f, p x) ∨ ∃ᶠ x in g, p x := by simp only [Filter.Frequently, eventually_sup, not_and_or] @[simp] theorem frequently_sSup {p : α → Prop} {fs : Set (Filter α)} : (∃ᶠ x in sSup fs, p x) ↔ ∃ f ∈ fs, ∃ᶠ x in f, p x := by simp only [Filter.Frequently, not_forall, eventually_sSup, exists_prop] @[simp] theorem frequently_iSup {p : α → Prop} {fs : β → Filter α} : (∃ᶠ x in ⨆ b, fs b, p x) ↔ ∃ b, ∃ᶠ x in fs b, p x := by simp only [Filter.Frequently, eventually_iSup, not_forall] theorem Eventually.choice {r : α → β → Prop} {l : Filter α} [l.NeBot] (h : ∀ᶠ x in l, ∃ y, r x y) : ∃ f : α → β, ∀ᶠ x in l, r x (f x) := by haveI : Nonempty β := let ⟨_, hx⟩ := h.exists; hx.nonempty choose! f hf using fun x (hx : ∃ y, r x y) => hx exact ⟨f, h.mono hf⟩ lemma skolem {ι : Type} {α : ι → Type} [∀ i, Nonempty (α i)] {P : ∀ i : ι, α i → Prop} {F : Filter ι} : (∀ᶠ i in F, ∃ b, P i b) ↔ ∃ b : (Π i, α i), ∀ᶠ i in F, P i (b i) := by classical refine ⟨fun H ↦ ?_, fun ⟨b, hb⟩ ↦ hb.mp (.of_forall fun x a ↦ ⟨_, a⟩)⟩ refine ⟨fun i ↦ if h : ∃ b, P i b then h.choose else Nonempty.some inferInstance, ?_⟩ filter_upwards [H] with i hi exact dif_pos hi ▸ hi.choose_spec /-! ### Relation “eventually equal” -/ section EventuallyEq variable {l : Filter α} {f g : α → β} theorem EventuallyEq.eventually (h : f =ᶠ[l] g) : ∀ᶠ x in l, f x = g x := h @[simp] lemma eventuallyEq_top : f =ᶠ[⊤] g ↔ f = g := by simp [EventuallyEq, funext_iff] theorem EventuallyEq.rw {l : Filter α} {f g : α → β} (h : f =ᶠ[l] g) (p : α → β → Prop) (hf : ∀ᶠ x in l, p x (f x)) : ∀ᶠ x in l, p x (g x) := hf.congr <\| h.mono fun _ hx => hx ▸ Iff.rfl theorem eventuallyEq_set {s t : Set α} {l : Filter α} : s =ᶠ[l] t ↔ ∀ᶠ x in l, x ∈ s ↔ x ∈ t := eventually_congr <\| Eventually.of_forall fun _ ↦ eq_iff_iff alias ⟨EventuallyEq.mem_iff, Eventually.set_eq⟩ := eventuallyEq_set @[simp] theorem eventuallyEq_univ {s : Set α} {l : Filter α} : s =ᶠ[l] univ ↔ s ∈ l := by simp [eventuallyEq_set] theorem EventuallyEq.exists_mem {l : Filter α} {f g : α → β} (h : f =ᶠ[l] g) : ∃ s ∈ l, EqOn f g s := Eventually.exists_mem h theorem eventuallyEq_of_mem {l : Filter α} {f g : α → β} {s : Set α} (hs : s ∈ l) (h : EqOn f g s) : f =ᶠ[l] g := eventually_of_mem hs h theorem eventuallyEq_iff_exists_mem {l : Filter α} {f g : α → β} : f =ᶠ[l] g ↔ ∃ s ∈ l, EqOn f g s := eventually_iff_exists_mem theorem EventuallyEq.filter_mono {l l' : Filter α} {f g : α → β} (h₁ : f =ᶠ[l] g) (h₂ : l' ≤ l) : f =ᶠ[l'] g := h₂ h₁ @[refl, simp] theorem EventuallyEq.refl (l : Filter α) (f : α → β) : f =ᶠ[l] f := Eventually.of_forall fun _ => rfl protected theorem EventuallyEq.rfl {l : Filter α} {f : α → β} : f =ᶠ[l] f := EventuallyEq.refl l f theorem EventuallyEq.of_eq {l : Filter α} {f g : α → β} (h : f = g) : f =ᶠ[l] g := h ▸ .rfl alias _root_.Eq.eventuallyEq := EventuallyEq.of_eq @[symm] theorem EventuallyEq.symm {f g : α → β} {l : Filter α} (H : f =ᶠ[l] g) : g =ᶠ[l] f := H.mono fun _ => Eq.symm lemma eventuallyEq_comm {f g : α → β} {l : Filter α} : f =ᶠ[l] g ↔ g =ᶠ[l] f := ⟨.symm, .symm⟩ @[trans] theorem EventuallyEq.trans {l : Filter α} {f g h : α → β} (H₁ : f =ᶠ[l] g) (H₂ : g =ᶠ[l] h) : f =ᶠ[l] h := H₂.rw (fun x y => f x = y) H₁ theorem EventuallyEq.congr_left {l : Filter α} {f g h : α → β} (H : f =ᶠ[l] g) : f =ᶠ[l] h ↔ g =ᶠ[l] h := ⟨H.symm.trans, H.trans⟩ theorem EventuallyEq.congr_right {l : Filter α} {f g h : α → β} (H : g =ᶠ[l] h) : f =ᶠ[l] g ↔ f =ᶠ[l] h := ⟨(·.trans H), (·.trans H.symm)⟩ instance {l : Filter α} : Trans ((· =ᶠ[l] ·) : (α → β) → (α → β) → Prop) (· =ᶠ[l] ·) (· =ᶠ[l] ·) where trans := EventuallyEq.trans theorem EventuallyEq.prodMk {l} {f f' : α → β} (hf : f =ᶠ[l] f') {g g' : α → γ} (hg : g =ᶠ[l] g') : (fun x => (f x, g x)) =ᶠ[l] fun x => (f' x, g' x) := hf.mp <\| hg.mono <\| by intros simp only [] @[deprecated (since := "2025-03-10")] alias EventuallyEq.prod_mk := EventuallyEq.prodMk -- See `EventuallyEq.comp_tendsto` further below for a similar statement w.r.t. -- composition on the right. theorem EventuallyEq.fun_comp {f g : α → β} {l : Filter α} (H : f =ᶠ[l] g) (h : β → γ) : h ∘ f =ᶠ[l] h ∘ g := H.mono fun _ hx => congr_arg h hx theorem EventuallyEq.comp₂ {δ} {f f' : α → β} {g g' : α → γ} {l} (Hf : f =ᶠ[l] f') (h : β → γ → δ) (Hg : g =ᶠ[l] g') : (fun x => h (f x) (g x)) =ᶠ[l] fun x => h (f' x) (g' x) := (Hf.prodMk Hg).fun_comp (uncurry h) @[to_additive] theorem EventuallyEq.mul [Mul β] {f f' g g' : α → β} {l : Filter α} (h : f =ᶠ[l] g) (h' : f' =ᶠ[l] g') : (fun x => f x * f' x) =ᶠ[l] fun x => g x * g' x := h.comp₂ (· * ·) h' @[to_additive const_smul] theorem EventuallyEq.pow_const {γ} [Pow β γ] {f g : α → β} {l : Filter α} (h : f =ᶠ[l] g) (c : γ) : (fun x => f x ^ c) =ᶠ[l] fun x => g x ^ c := h.fun_comp (· ^ c) @[to_additive] theorem EventuallyEq.inv [Inv β] {f g : α → β} {l : Filter α} (h : f =ᶠ[l] g) : (fun x => (f x)⁻¹) =ᶠ[l] fun x => (g x)⁻¹ := h.fun_comp Inv.inv @[to_additive] theorem EventuallyEq.div [Div β] {f f' g g' : α → β} {l : Filter α} (h : f =ᶠ[l] g) (h' : f' =ᶠ[l] g') : (fun x => f x / f' x) =ᶠ[l] fun x => g x / g' x := h.comp₂ (· / ·) h' attribute [to_additive] EventuallyEq.const_smul @[to_additive] theorem EventuallyEq.smul {𝕜} [SMul 𝕜 β] {l : Filter α} {f f' : α → 𝕜} {g g' : α → β} (hf : f =ᶠ[l] f') (hg : g =ᶠ[l] g') : (fun x => f x • g x) =ᶠ[l] fun x => f' x • g' x := hf.comp₂ (· • ·) hg theorem EventuallyEq.sup [Max β] {l : Filter α} {f f' g g' : α → β} (hf : f =ᶠ[l] f') (hg : g =ᶠ[l] g') : (fun x => f x ⊔ g x) =ᶠ[l] fun x => f' x ⊔ g' x := hf.comp₂ (· ⊔ ·) hg theorem EventuallyEq.inf [Min β] {l : Filter α} {f f' g g' : α → β} (hf : f =ᶠ[l] f') (hg : g =ᶠ[l] g') : (fun x => f x ⊓ g x) =ᶠ[l] fun x => f' x ⊓ g' x := hf.comp₂ (· ⊓ ·) hg theorem EventuallyEq.preimage {l : Filter α} {f g : α → β} (h : f =ᶠ[l] g) (s : Set β) : f ⁻¹' s =ᶠ[l] g ⁻¹' s := h.fun_comp s theorem EventuallyEq.inter {s t s' t' : Set α} {l : Filter α} (h : s =ᶠ[l] t) (h' : s' =ᶠ[l] t') : (s ∩ s' : Set α) =ᶠ[l] (t ∩ t' : Set α) :=	h.comp₂ (· ∧ ·) h' theorem EventuallyEq.union {s t s' t' : Set α} {l : Filter α} (h : s =ᶠ[l] t) (h' : s' =ᶠ[l] t') : (s ∪ s' : Set α) =ᶠ[l] (t ∪ t' : Set α) :=	Mathlib/Order/Filter/Basic.lean	989	992
/- 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.CategoryTheory.Elementwise import Mathlib.CategoryTheory.Limits.FunctorCategory.EpiMono import Mathlib.Tactic.CategoryTheory.Elementwise import Mathlib.CategoryTheory.Sites.ConcreteSheafification import Mathlib.CategoryTheory.Subpresheaf.Image import Mathlib.CategoryTheory.Subpresheaf.Sieves /-! # Subsheaf of types We define the sub(pre)sheaf of a type valued presheaf. ## Main results - `CategoryTheory.Subpresheaf` : A subpresheaf of a presheaf of types. - `CategoryTheory.Subpresheaf.sheafify` : The sheafification of a subpresheaf as a subpresheaf. Note that this is a sheaf only when the whole sheaf is. - `CategoryTheory.Subpresheaf.sheafify_isSheaf` : The sheafification is a sheaf - `CategoryTheory.Subpresheaf.sheafifyLift` : The descent of a map into a sheaf to the sheafification. - `CategoryTheory.GrothendieckTopology.imageSheaf` : The image sheaf of a morphism. - `CategoryTheory.GrothendieckTopology.imageFactorization` : The image sheaf as a `Limits.imageFactorization`. -/ universe w v u open Opposite CategoryTheory namespace CategoryTheory variable {C : Type u} [Category.{v} C] (J : GrothendieckTopology C) variable {F F' F'' : Cᵒᵖ ⥤ Type w} (G G' : Subpresheaf F) /-- The sheafification of a subpresheaf as a subpresheaf. Note that this is a sheaf only when the whole presheaf is a sheaf. -/ def Subpresheaf.sheafify : Subpresheaf F where obj U := { s \| G.sieveOfSection s ∈ J (unop U) } map := by rintro U V i s hs refine J.superset_covering ?_ (J.pullback_stable i.unop hs) intro _ _ h dsimp at h ⊢ rwa [← FunctorToTypes.map_comp_apply] theorem Subpresheaf.le_sheafify : G ≤ G.sheafify J := by intro U s hs change _ ∈ J _ convert J.top_mem U.unop -- Porting note: `U.unop` can not be inferred now rw [eq_top_iff] rintro V i - exact G.map i.op hs variable {J} theorem Subpresheaf.eq_sheafify (h : Presieve.IsSheaf J F) (hG : Presieve.IsSheaf J G.toPresheaf) : G = G.sheafify J := by apply (G.le_sheafify J).antisymm intro U s hs suffices ((hG _ hs).amalgamate _ (G.family_of_elements_compatible s)).1 = s by rw [← this] exact ((hG _ hs).amalgamate _ (G.family_of_elements_compatible s)).2 apply (h _ hs).isSeparatedFor.ext intro V i hi exact (congr_arg Subtype.val ((hG _ hs).valid_glue (G.family_of_elements_compatible s) _ hi) :) theorem Subpresheaf.sheafify_isSheaf (hF : Presieve.IsSheaf J F) : Presieve.IsSheaf J (G.sheafify J).toPresheaf := by intro U S hS x hx let S' := Sieve.bind S fun Y f hf => G.sieveOfSection (x f hf).1 have := fun (V) (i : V ⟶ U) (hi : S' i) => hi -- Porting note: change to explicit variable so that `choose` can find the correct -- dependent functions. Thus everything follows need two additional explicit variables. choose W i₁ i₂ hi₂ h₁ h₂ using this dsimp [-Sieve.bind_apply] at * let x'' : Presieve.FamilyOfElements F S' := fun V i hi => F.map (i₁ V i hi).op (x _ (hi₂ V i hi)) have H : ∀ s, x.IsAmalgamation s ↔ x''.IsAmalgamation s.1 := by intro s constructor · intro H V i hi dsimp only [x''] conv_lhs => rw [← h₂ _ _ hi] rw [← H _ (hi₂ _ _ hi)] exact FunctorToTypes.map_comp_apply F (i₂ _ _ hi).op (i₁ _ _ hi).op _ · intro H V i hi refine Subtype.ext ?_ apply (hF _ (x i hi).2).isSeparatedFor.ext intro V' i' hi' have hi'' : S' (i' ≫ i) := ⟨_, _, _, hi, hi', rfl⟩ have := H _ hi'' rw [op_comp, F.map_comp] at this exact this.trans (congr_arg Subtype.val (hx _ _ (hi₂ _ _ hi'') hi (h₂ _ _ hi''))) have : x''.Compatible := by intro V₁ V₂ V₃ g₁ g₂ g₃ g₄ S₁ S₂ e rw [← FunctorToTypes.map_comp_apply, ← FunctorToTypes.map_comp_apply] exact congr_arg Subtype.val (hx (g₁ ≫ i₁ _ _ S₁) (g₂ ≫ i₁ _ _ S₂) (hi₂ _ _ S₁) (hi₂ _ _ S₂) (by simp only [Category.assoc, h₂, e])) obtain ⟨t, ht, ht'⟩ := hF _ (J.bind_covering hS fun V i hi => (x i hi).2) _ this refine ⟨⟨t, _⟩, (H ⟨t, ?_⟩).mpr ht, fun y hy => Subtype.ext (ht' _ ((H _).mp hy))⟩ refine J.superset_covering ?_ (J.bind_covering hS fun V i hi => (x i hi).2) intro V i hi dsimp rw [ht _ hi] exact h₁ _ _ hi theorem Subpresheaf.eq_sheafify_iff (h : Presieve.IsSheaf J F) : G = G.sheafify J ↔ Presieve.IsSheaf J G.toPresheaf := ⟨fun e => e.symm ▸ G.sheafify_isSheaf h, G.eq_sheafify h⟩ theorem Subpresheaf.isSheaf_iff (h : Presieve.IsSheaf J F) : Presieve.IsSheaf J G.toPresheaf ↔ ∀ (U) (s : F.obj U), G.sieveOfSection s ∈ J (unop U) → s ∈ G.obj U := by rw [← G.eq_sheafify_iff h] change _ ↔ G.sheafify J ≤ G exact ⟨Eq.ge, (G.le_sheafify J).antisymm⟩ theorem Subpresheaf.sheafify_sheafify (h : Presieve.IsSheaf J F) : (G.sheafify J).sheafify J = G.sheafify J := ((Subpresheaf.eq_sheafify_iff _ h).mpr <\| G.sheafify_isSheaf h).symm /-- The lift of a presheaf morphism onto the sheafification subpresheaf. -/ noncomputable def Subpresheaf.sheafifyLift (f : G.toPresheaf ⟶ F') (h : Presieve.IsSheaf J F') : (G.sheafify J).toPresheaf ⟶ F' where app _ s := (h (G.sieveOfSection s.1) s.prop).amalgamate (_) ((G.family_of_elements_compatible s.1).compPresheafMap f) naturality := by intro U V i ext s apply (h _ ((Subpresheaf.sheafify J G).toPresheaf.map i s).prop).isSeparatedFor.ext intro W j hj refine (Presieve.IsSheafFor.valid_glue (h _ ((G.sheafify J).toPresheaf.map i s).2) ((G.family_of_elements_compatible _).compPresheafMap _) _ hj).trans ?_ dsimp conv_rhs => rw [← FunctorToTypes.map_comp_apply] change _ = F'.map (j ≫ i.unop).op _ refine Eq.trans ?_ (Presieve.IsSheafFor.valid_glue (h _ s.2) ((G.family_of_elements_compatible s.1).compPresheafMap f) (j ≫ i.unop) ?_).symm · dsimp [Presieve.FamilyOfElements.compPresheafMap] exact congr_arg _ (Subtype.ext (FunctorToTypes.map_comp_apply _ _ _ _).symm) · dsimp [Presieve.FamilyOfElements.compPresheafMap] at hj ⊢ rwa [FunctorToTypes.map_comp_apply] theorem Subpresheaf.to_sheafifyLift (f : G.toPresheaf ⟶ F') (h : Presieve.IsSheaf J F') : Subpresheaf.homOfLe (G.le_sheafify J) ≫ G.sheafifyLift f h = f := by ext U s apply (h _ ((Subpresheaf.homOfLe (G.le_sheafify J)).app U s).prop).isSeparatedFor.ext intro V i hi have := elementwise_of% f.naturality -- Porting note: filled in some underscores where Lean3 could automatically fill. exact (Presieve.IsSheafFor.valid_glue (h _ ((homOfLe (_ : G ≤ sheafify J G)).app U s).2) ((G.family_of_elements_compatible _).compPresheafMap _) _ hi).trans (this _ _) theorem Subpresheaf.to_sheafify_lift_unique (h : Presieve.IsSheaf J F') (l₁ l₂ : (G.sheafify J).toPresheaf ⟶ F') (e : Subpresheaf.homOfLe (G.le_sheafify J) ≫ l₁ = Subpresheaf.homOfLe (G.le_sheafify J) ≫ l₂) : l₁ = l₂ := by ext U ⟨s, hs⟩ apply (h _ hs).isSeparatedFor.ext rintro V i hi dsimp at hi rw [← FunctorToTypes.naturality, ← FunctorToTypes.naturality] exact (congr_fun (congr_app e <\| op V) ⟨_, hi⟩ :) theorem Subpresheaf.sheafify_le (h : G ≤ G') (hF : Presieve.IsSheaf J F) (hG' : Presieve.IsSheaf J G'.toPresheaf) : G.sheafify J ≤ G' := by intro U x hx convert ((G.sheafifyLift (Subpresheaf.homOfLe h) hG').app U ⟨x, hx⟩).2 apply (hF _ hx).isSeparatedFor.ext intro V i hi have := congr_arg (fun f : G.toPresheaf ⟶ G'.toPresheaf => (NatTrans.app f (op V) ⟨_, hi⟩).1) (G.to_sheafifyLift (Subpresheaf.homOfLe h) hG') convert this.symm rw [← Subpresheaf.nat_trans_naturality] rfl section Image variable (J) in /-- A morphism factors through the sheafification of the image presheaf. -/ @[simps!] def Subpresheaf.toRangeSheafify (f : F' ⟶ F) : F' ⟶ ((Subpresheaf.range f).sheafify J).toPresheaf := toRange f ≫ Subpresheaf.homOfLe ((range f).le_sheafify J) /-- The image sheaf of a morphism between sheaves, defined to be the sheafification of `image_presheaf`. -/ @[simps] def Sheaf.image {F F' : Sheaf J (Type w)} (f : F ⟶ F') : Sheaf J (Type w) := ⟨((Subpresheaf.range f.1).sheafify J).toPresheaf, by	rw [isSheaf_iff_isSheaf_of_type] apply Subpresheaf.sheafify_isSheaf rw [← isSheaf_iff_isSheaf_of_type] exact F'.2⟩ /-- A morphism factors through the image sheaf. -/ @[simps] def Sheaf.toImage {F F' : Sheaf J (Type w)} (f : F ⟶ F') : F ⟶ Sheaf.image f := ⟨Subpresheaf.toRangeSheafify J f.1⟩	Mathlib/CategoryTheory/Sites/Subsheaf.lean	204	213
/- 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.MvPolynomial.Eval /-! # Renaming variables of polynomials This file establishes the `rename` operation on multivariate polynomials, which modifies the set of variables. ## Main declarations * `MvPolynomial.rename` * `MvPolynomial.renameEquiv` ## Notation As in other polynomial files, we typically use the notation: + `σ τ α : Type` (indexing the variables) + `R S : Type` `[CommSemiring R]` `[CommSemiring S]` (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` elements of the coefficient ring + `i : σ`, with corresponding monomial `X i`, often denoted `X_i` by mathematicians + `p : MvPolynomial σ α` -/ noncomputable section open Set Function Finsupp AddMonoidAlgebra variable {σ τ α R S : Type} [CommSemiring R] [CommSemiring S] namespace MvPolynomial section Rename /-- Rename all the variables in a multivariable polynomial. -/ def rename (f : σ → τ) : MvPolynomial σ R →ₐ[R] MvPolynomial τ R := aeval (X ∘ f) theorem rename_C (f : σ → τ) (r : R) : rename f (C r) = C r := eval₂_C _ _ _ @[simp] theorem rename_X (f : σ → τ) (i : σ) : rename f (X i : MvPolynomial σ R) = X (f i) := eval₂_X _ _ _ theorem map_rename (f : R →+ S) (g : σ → τ) (p : MvPolynomial σ R) : map f (rename g p) = rename g (map f p) := by apply MvPolynomial.induction_on p (fun a => by simp only [map_C, rename_C]) (fun p q hp hq => by simp only [hp, hq, map_add]) fun p n hp => by simp only [hp, rename_X, map_X, map_mul] lemma map_comp_rename (f : R →+* S) (g : σ → τ) : (map f).comp (rename g).toRingHom = (rename g).toRingHom.comp (map f) := RingHom.ext fun p ↦ map_rename f g p @[simp] theorem rename_rename (f : σ → τ) (g : τ → α) (p : MvPolynomial σ R) : rename g (rename f p) = rename (g ∘ f) p := show rename g (eval₂ C (X ∘ f) p) = _ by simp only [rename, aeval_eq_eval₂Hom] -- Porting note: the Lean 3 proof of this was very fragile and included a nonterminal `simp`. -- Hopefully this is less prone to breaking rw [eval₂_comp_left (eval₂Hom (algebraMap R (MvPolynomial α R)) (X ∘ g)) C (X ∘ f) p] simp only [comp_def, eval₂Hom_X'] refine eval₂Hom_congr ?_ rfl rfl ext1; simp only [comp_apply, RingHom.coe_comp, eval₂Hom_C] lemma rename_comp_rename (f : σ → τ) (g : τ → α) : (rename (R := R) g).comp (rename f) = rename (g ∘ f) := AlgHom.ext fun p ↦ rename_rename f g p @[simp] theorem rename_id : rename id = AlgHom.id R (MvPolynomial σ R) := AlgHom.ext fun p ↦ eval₂_eta p lemma rename_id_apply (p : MvPolynomial σ R) : rename id p = p := by simp theorem rename_monomial (f : σ → τ) (d : σ →₀ ℕ) (r : R) : rename f (monomial d r) = monomial (d.mapDomain f) r := by rw [rename, aeval_monomial, monomial_eq (s := Finsupp.mapDomain f d), Finsupp.prod_mapDomain_index] · rfl · exact fun n => pow_zero _ · exact fun n i₁ i₂ => pow_add _ _ _ theorem rename_eq (f : σ → τ) (p : MvPolynomial σ R) : rename f p = Finsupp.mapDomain (Finsupp.mapDomain f) p := by simp only [rename, aeval_def, eval₂, Finsupp.mapDomain, algebraMap_eq, comp_apply, X_pow_eq_monomial, ← monomial_finsupp_sum_index] rfl theorem rename_injective (f : σ → τ) (hf : Function.Injective f) : Function.Injective (rename f : MvPolynomial σ R → MvPolynomial τ R) := by have : (rename f : MvPolynomial σ R → MvPolynomial τ R) = Finsupp.mapDomain (Finsupp.mapDomain f) := funext (rename_eq f) rw [this] exact Finsupp.mapDomain_injective (Finsupp.mapDomain_injective hf) theorem rename_leftInverse {f : σ → τ} {g : τ → σ} (hf : Function.LeftInverse f g) : Function.LeftInverse (rename f : MvPolynomial σ R → MvPolynomial τ R) (rename g) := by intro x simp [hf.comp_eq_id] theorem rename_rightInverse {f : σ → τ} {g : τ → σ} (hf : Function.RightInverse f g) : Function.RightInverse (rename f : MvPolynomial σ R → MvPolynomial τ R) (rename g) := rename_leftInverse hf theorem rename_surjective (f : σ → τ) (hf : Function.Surjective f) : Function.Surjective (rename f : MvPolynomial σ R → MvPolynomial τ R) := let ⟨_, hf⟩ := hf.hasRightInverse; rename_rightInverse hf \|>.surjective section variable {f : σ → τ} (hf : Function.Injective f)	open Classical in /-- Given a function between sets of variables `f : σ → τ` that is injective with proof `hf`, `MvPolynomial.killCompl hf` is the `AlgHom` from `R[τ]` to `R[σ]` that is left inverse to `rename f : R[σ] → R[τ]` and sends the variables in the complement of the range of `f` to `0`. -/	Mathlib/Algebra/MvPolynomial/Rename.lean	133	136
/- 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.Group.Int import Mathlib.Algebra.Order.Group.Unbundled.Int import Mathlib.Algebra.Order.Ring.Defs import Mathlib.Algebra.Ring.Int.Parity import Mathlib.Data.Set.Basic /-! # The integers form a linear ordered ring This file contains: * instances on `ℤ`. The stronger one is `Int.instLinearOrderedCommRing`. * basic lemmas about integers that involve order properties. ## Recursors * `Int.rec`: Sign disjunction. Something is true/defined on `ℤ` if it's true/defined for nonnegative and for negative values. (Defined in core Lean 3) * `Int.inductionOn`: Simple growing induction on positive numbers, plus simple decreasing induction on negative numbers. Note that this recursor is currently only `Prop`-valued. * `Int.inductionOn'`: Simple growing induction for numbers greater than `b`, plus simple decreasing induction on numbers less than `b`. -/ -- We should need only a minimal development of sets in order to get here. assert_not_exists Set.Subsingleton open Function Nat namespace Int instance instZeroLEOneClass : ZeroLEOneClass ℤ := ⟨Int.zero_lt_one.le⟩ instance instIsStrictOrderedRing : IsStrictOrderedRing ℤ := .of_mul_pos @Int.mul_pos /-! ### Miscellaneous lemmas -/ lemma isCompl_even_odd : IsCompl { n : ℤ \| Even n } { n \| Odd n } := by simp [← not_even_iff_odd, ← Set.compl_setOf, isCompl_compl] lemma _root_.Nat.cast_natAbs {α : Type*} [AddGroupWithOne α] (n : ℤ) : (n.natAbs : α) = \|n\| := by rw [← natCast_natAbs, Int.cast_natCast] lemma two_le_iff_pos_of_even {m : ℤ} (even : Even m) : 2 ≤ m ↔ 0 < m := le_iff_pos_of_dvd (by decide) even.two_dvd lemma add_two_le_iff_lt_of_even_sub {m n : ℤ} (even : Even (n - m)) : m + 2 ≤ n ↔ m < n := by rw [add_comm]; exact le_add_iff_lt_of_dvd_sub (by decide) even.two_dvd end Int		Mathlib/Algebra/Order/Ring/Int.lean	63	67
/- 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.Algebra.BigOperators.GroupWithZero.Finset import Mathlib.Algebra.GroupWithZero.Subgroup import Mathlib.Data.Finite.Card import Mathlib.Data.Finite.Prod import Mathlib.Data.Set.Card import Mathlib.GroupTheory.Coset.Card import Mathlib.GroupTheory.GroupAction.Quotient import Mathlib.GroupTheory.QuotientGroup.Basic /-! # Index of a Subgroup In this file we define the index of a subgroup, and prove several divisibility properties. Several theorems proved in this file are known as Lagrange's theorem. ## Main definitions - `H.index` : the index of `H : Subgroup G` as a natural number, and returns 0 if the index is infinite. - `H.relindex K` : the relative index of `H : Subgroup G` in `K : Subgroup G` as a natural number, and returns 0 if the relative index is infinite. # Main results - `card_mul_index` : `Nat.card H * H.index = Nat.card G` - `index_mul_card` : `H.index * Fintype.card H = Fintype.card G` - `index_dvd_card` : `H.index ∣ Fintype.card G` - `relindex_mul_index` : If `H ≤ K`, then `H.relindex K * K.index = H.index` - `index_dvd_of_le` : If `H ≤ K`, then `K.index ∣ H.index` - `relindex_mul_relindex` : `relindex` is multiplicative in towers - `MulAction.index_stabilizer`: the index of the stabilizer is the cardinality of the orbit -/ assert_not_exists Field open scoped Pointwise namespace Subgroup open Cardinal Function variable {G G' : Type} [Group G] [Group G'] (H K L : Subgroup G) /-- The index of a subgroup as a natural number. Returns `0` if the index is infinite. -/ @[to_additive "The index of an additive subgroup as a natural number. Returns 0 if the index is infinite."] noncomputable def index : ℕ := Nat.card (G ⧸ H) /-- If `H` and `K` are subgroups of a group `G`, then `relindex H K : ℕ` is the index of `H ∩ K` in `K`. The function returns `0` if the index is infinite. -/ @[to_additive "If `H` and `K` are subgroups of an additive group `G`, then `relindex H K : ℕ` is the index of `H ∩ K` in `K`. The function returns `0` if the index is infinite."] noncomputable def relindex : ℕ := (H.subgroupOf K).index @[to_additive] theorem index_comap_of_surjective {f : G' → G} (hf : Function.Surjective f) : (H.comap f).index = H.index := by have key : ∀ x y : G', QuotientGroup.leftRel (H.comap f) x y ↔ QuotientGroup.leftRel H (f x) (f y) := by simp only [QuotientGroup.leftRel_apply] exact fun x y => iff_of_eq (congr_arg (· ∈ H) (by rw [f.map_mul, f.map_inv])) refine Cardinal.toNat_congr (Equiv.ofBijective (Quotient.map' f fun x y => (key x y).mp) ⟨?_, ?_⟩) · simp_rw [← Quotient.eq''] at key refine Quotient.ind' fun x => ?_ refine Quotient.ind' fun y => ?_ exact (key x y).mpr · refine Quotient.ind' fun x => ?_ obtain ⟨y, hy⟩ := hf x exact ⟨y, (Quotient.map'_mk'' f _ y).trans (congr_arg Quotient.mk'' hy)⟩ @[to_additive] theorem index_comap (f : G' →* G) : (H.comap f).index = H.relindex f.range := Eq.trans (congr_arg index (by rfl)) ((H.subgroupOf f.range).index_comap_of_surjective f.rangeRestrict_surjective) @[to_additive] theorem relindex_comap (f : G' →* G) (K : Subgroup G') : relindex (comap f H) K = relindex H (map f K) := by rw [relindex, subgroupOf, comap_comap, index_comap, ← f.map_range, K.range_subtype] variable {H K L} @[to_additive relindex_mul_index] theorem relindex_mul_index (h : H ≤ K) : H.relindex K * K.index = H.index := ((mul_comm _ _).trans (Cardinal.toNat_mul _ _).symm).trans (congr_arg Cardinal.toNat (Equiv.cardinal_eq (quotientEquivProdOfLE h))).symm @[to_additive] theorem index_dvd_of_le (h : H ≤ K) : K.index ∣ H.index := dvd_of_mul_left_eq (H.relindex K) (relindex_mul_index h) @[to_additive] theorem relindex_dvd_index_of_le (h : H ≤ K) : H.relindex K ∣ H.index := dvd_of_mul_right_eq K.index (relindex_mul_index h) @[to_additive] theorem relindex_subgroupOf (hKL : K ≤ L) : (H.subgroupOf L).relindex (K.subgroupOf L) = H.relindex K := ((index_comap (H.subgroupOf L) (inclusion hKL)).trans (congr_arg _ (inclusion_range hKL))).symm variable (H K L) @[to_additive relindex_mul_relindex] theorem relindex_mul_relindex (hHK : H ≤ K) (hKL : K ≤ L) : H.relindex K * K.relindex L = H.relindex L := by rw [← relindex_subgroupOf hKL] exact relindex_mul_index fun x hx => hHK hx @[to_additive] theorem inf_relindex_right : (H ⊓ K).relindex K = H.relindex K := by rw [relindex, relindex, inf_subgroupOf_right] @[to_additive] theorem inf_relindex_left : (H ⊓ K).relindex H = K.relindex H := by rw [inf_comm, inf_relindex_right] @[to_additive relindex_inf_mul_relindex] theorem relindex_inf_mul_relindex : H.relindex (K ⊓ L) * K.relindex L = (H ⊓ K).relindex L := by rw [← inf_relindex_right H (K ⊓ L), ← inf_relindex_right K L, ← inf_relindex_right (H ⊓ K) L, inf_assoc, relindex_mul_relindex (H ⊓ (K ⊓ L)) (K ⊓ L) L inf_le_right inf_le_right] @[to_additive (attr := simp)] theorem relindex_sup_right [K.Normal] : K.relindex (H ⊔ K) = K.relindex H := Nat.card_congr (QuotientGroup.quotientInfEquivProdNormalQuotient H K).toEquiv.symm @[to_additive (attr := simp)] theorem relindex_sup_left [K.Normal] : K.relindex (K ⊔ H) = K.relindex H := by rw [sup_comm, relindex_sup_right] @[to_additive] theorem relindex_dvd_index_of_normal [H.Normal] : H.relindex K ∣ H.index := relindex_sup_right K H ▸ relindex_dvd_index_of_le le_sup_right variable {H K} @[to_additive] theorem relindex_dvd_of_le_left (hHK : H ≤ K) : K.relindex L ∣ H.relindex L := inf_of_le_left hHK ▸ dvd_of_mul_left_eq _ (relindex_inf_mul_relindex _ _ _) /-- A subgroup has index two if and only if there exists `a` such that for all `b`, exactly one of `b * a` and `b` belong to `H`. -/ @[to_additive "An additive subgroup has index two if and only if there exists `a` such that for all `b`, exactly one of `b + a` and `b` belong to `H`."] theorem index_eq_two_iff : H.index = 2 ↔ ∃ a, ∀ b, Xor' (b * a ∈ H) (b ∈ H) := by simp only [index, Nat.card_eq_two_iff' ((1 : G) : G ⧸ H), ExistsUnique, inv_mem_iff, QuotientGroup.exists_mk, QuotientGroup.forall_mk, Ne, QuotientGroup.eq, mul_one, xor_iff_iff_not] refine exists_congr fun a => ⟨fun ha b => ⟨fun hba hb => ?_, fun hb => ?_⟩, fun ha => ⟨?_, fun b hb => ?_⟩⟩ · exact ha.1 ((mul_mem_cancel_left hb).1 hba) · exact inv_inv b ▸ ha.2 _ (mt (inv_mem_iff (x := b)).1 hb) · rw [← inv_mem_iff (x := a), ← ha, inv_mul_cancel] exact one_mem _ · rwa [ha, inv_mem_iff (x := b)] @[to_additive] theorem mul_mem_iff_of_index_two (h : H.index = 2) {a b : G} : a * b ∈ H ↔ (a ∈ H ↔ b ∈ H) := by by_cases ha : a ∈ H; · simp only [ha, true_iff, mul_mem_cancel_left ha] by_cases hb : b ∈ H; · simp only [hb, iff_true, mul_mem_cancel_right hb] simp only [ha, hb, iff_true] rcases index_eq_two_iff.1 h with ⟨c, hc⟩ refine (hc _).or.resolve_left ?_ rwa [mul_assoc, mul_mem_cancel_right ((hc _).or.resolve_right hb)] @[to_additive] theorem mul_self_mem_of_index_two (h : H.index = 2) (a : G) : a * a ∈ H := by rw [mul_mem_iff_of_index_two h] @[to_additive two_smul_mem_of_index_two] theorem sq_mem_of_index_two (h : H.index = 2) (a : G) : a ^ 2 ∈ H := (pow_two a).symm ▸ mul_self_mem_of_index_two h a variable (H K) {f : G →* G'} @[to_additive (attr := simp)] theorem index_top : (⊤ : Subgroup G).index = 1 := Nat.card_eq_one_iff_unique.mpr ⟨QuotientGroup.subsingleton_quotient_top, ⟨1⟩⟩ @[to_additive (attr := simp)] theorem index_bot : (⊥ : Subgroup G).index = Nat.card G := Cardinal.toNat_congr QuotientGroup.quotientBot.toEquiv @[to_additive (attr := simp)] theorem relindex_top_left : (⊤ : Subgroup G).relindex H = 1 := index_top @[to_additive (attr := simp)] theorem relindex_top_right : H.relindex ⊤ = H.index := by rw [← relindex_mul_index (show H ≤ ⊤ from le_top), index_top, mul_one] @[to_additive (attr := simp)] theorem relindex_bot_left : (⊥ : Subgroup G).relindex H = Nat.card H := by rw [relindex, bot_subgroupOf, index_bot] @[to_additive (attr := simp)] theorem relindex_bot_right : H.relindex ⊥ = 1 := by rw [relindex, subgroupOf_bot_eq_top, index_top] @[to_additive (attr := simp)] theorem relindex_self : H.relindex H = 1 := by rw [relindex, subgroupOf_self, index_top] @[to_additive] theorem index_ker (f : G →* G') : f.ker.index = Nat.card f.range := by rw [← MonoidHom.comap_bot, index_comap, relindex_bot_left] @[to_additive] theorem relindex_ker (f : G →* G') : f.ker.relindex K = Nat.card (K.map f) := by rw [← MonoidHom.comap_bot, relindex_comap, relindex_bot_left] @[to_additive (attr := simp) card_mul_index] theorem card_mul_index : Nat.card H * H.index = Nat.card G := by rw [← relindex_bot_left, ← index_bot] exact relindex_mul_index bot_le @[to_additive] theorem card_dvd_of_surjective (f : G →* G') (hf : Function.Surjective f) : Nat.card G' ∣ Nat.card G := by rw [← Nat.card_congr (QuotientGroup.quotientKerEquivOfSurjective f hf).toEquiv] exact Dvd.intro_left (Nat.card f.ker) f.ker.card_mul_index @[to_additive] theorem card_range_dvd (f : G →* G') : Nat.card f.range ∣ Nat.card G := card_dvd_of_surjective f.rangeRestrict f.rangeRestrict_surjective @[to_additive] theorem card_map_dvd (f : G →* G') : Nat.card (H.map f) ∣ Nat.card H := card_dvd_of_surjective (f.subgroupMap H) (f.subgroupMap_surjective H) @[to_additive] theorem index_map (f : G →* G') : (H.map f).index = (H ⊔ f.ker).index * f.range.index := by rw [← comap_map_eq, index_comap, relindex_mul_index (H.map_le_range f)] @[to_additive] theorem index_map_dvd {f : G →* G'} (hf : Function.Surjective f) : (H.map f).index ∣ H.index := by rw [index_map, f.range_eq_top_of_surjective hf, index_top, mul_one] exact index_dvd_of_le le_sup_left @[to_additive] theorem dvd_index_map {f : G →* G'} (hf : f.ker ≤ H) : H.index ∣ (H.map f).index := by rw [index_map, sup_of_le_left hf] apply dvd_mul_right @[to_additive] theorem index_map_eq (hf1 : Surjective f) (hf2 : f.ker ≤ H) : (H.map f).index = H.index := Nat.dvd_antisymm (H.index_map_dvd hf1) (H.dvd_index_map hf2) @[to_additive] lemma index_map_of_bijective (hf : Bijective f) (H : Subgroup G) : (H.map f).index = H.index := index_map_eq _ hf.2 (by rw [f.ker_eq_bot_iff.2 hf.1]; exact bot_le) @[to_additive] theorem index_map_of_injective {f : G →* G'} (hf : Function.Injective f) : (H.map f).index = H.index * f.range.index := by rw [H.index_map, f.ker_eq_bot_iff.mpr hf, sup_bot_eq] @[to_additive] theorem index_map_subtype {H : Subgroup G} (K : Subgroup H) : (K.map H.subtype).index = K.index * H.index := by rw [K.index_map_of_injective H.subtype_injective, H.range_subtype] @[to_additive] theorem index_eq_card : H.index = Nat.card (G ⧸ H) := rfl @[to_additive index_mul_card] theorem index_mul_card : H.index * Nat.card H = Nat.card G := by rw [mul_comm, card_mul_index] @[to_additive] theorem index_dvd_card : H.index ∣ Nat.card G := ⟨Nat.card H, H.index_mul_card.symm⟩ @[to_additive] theorem relindex_dvd_card : H.relindex K ∣ Nat.card K := (H.subgroupOf K).index_dvd_card variable {H K L} @[to_additive] theorem relindex_eq_zero_of_le_left (hHK : H ≤ K) (hKL : K.relindex L = 0) : H.relindex L = 0 := eq_zero_of_zero_dvd (hKL ▸ relindex_dvd_of_le_left L hHK) @[to_additive] theorem relindex_eq_zero_of_le_right (hKL : K ≤ L) (hHK : H.relindex K = 0) : H.relindex L = 0 := Finite.card_eq_zero_of_embedding (quotientSubgroupOfEmbeddingOfLE H hKL) hHK @[to_additive] theorem index_eq_zero_of_relindex_eq_zero (h : H.relindex K = 0) : H.index = 0 := H.relindex_top_right.symm.trans (relindex_eq_zero_of_le_right le_top h) @[to_additive] theorem relindex_le_of_le_left (hHK : H ≤ K) (hHL : H.relindex L ≠ 0) : K.relindex L ≤ H.relindex L := Nat.le_of_dvd (Nat.pos_of_ne_zero hHL) (relindex_dvd_of_le_left L hHK) @[to_additive] theorem relindex_le_of_le_right (hKL : K ≤ L) (hHL : H.relindex L ≠ 0) : H.relindex K ≤ H.relindex L := Finite.card_le_of_embedding' (quotientSubgroupOfEmbeddingOfLE H hKL) fun h => (hHL h).elim @[to_additive] theorem relindex_ne_zero_trans (hHK : H.relindex K ≠ 0) (hKL : K.relindex L ≠ 0) : H.relindex L ≠ 0 := fun h => mul_ne_zero (mt (relindex_eq_zero_of_le_right (show K ⊓ L ≤ K from inf_le_left)) hHK) hKL ((relindex_inf_mul_relindex H K L).trans (relindex_eq_zero_of_le_left inf_le_left h)) @[to_additive] theorem relindex_inf_ne_zero (hH : H.relindex L ≠ 0) (hK : K.relindex L ≠ 0) : (H ⊓ K).relindex L ≠ 0 := by replace hH : H.relindex (K ⊓ L) ≠ 0 := mt (relindex_eq_zero_of_le_right inf_le_right) hH rw [← inf_relindex_right] at hH hK ⊢ rw [inf_assoc] exact relindex_ne_zero_trans hH hK @[to_additive] theorem index_inf_ne_zero (hH : H.index ≠ 0) (hK : K.index ≠ 0) : (H ⊓ K).index ≠ 0 := by rw [← relindex_top_right] at hH hK ⊢ exact relindex_inf_ne_zero hH hK @[to_additive] theorem relindex_inf_le : (H ⊓ K).relindex L ≤ H.relindex L * K.relindex L := by by_cases h : H.relindex L = 0 · exact (le_of_eq (relindex_eq_zero_of_le_left inf_le_left h)).trans (zero_le _) rw [← inf_relindex_right, inf_assoc, ← relindex_mul_relindex _ _ L inf_le_right inf_le_right, inf_relindex_right, inf_relindex_right] exact mul_le_mul_right' (relindex_le_of_le_right inf_le_right h) (K.relindex L) @[to_additive] theorem index_inf_le : (H ⊓ K).index ≤ H.index * K.index := by simp_rw [← relindex_top_right, relindex_inf_le] @[to_additive] theorem relindex_iInf_ne_zero {ι : Type} [_hι : Finite ι] {f : ι → Subgroup G} (hf : ∀ i, (f i).relindex L ≠ 0) : (⨅ i, f i).relindex L ≠ 0 := haveI := Fintype.ofFinite ι (Finset.prod_ne_zero_iff.mpr fun i _hi => hf i) ∘ Nat.card_pi.symm.trans ∘ Finite.card_eq_zero_of_embedding (quotientiInfSubgroupOfEmbedding f L) @[to_additive] theorem relindex_iInf_le {ι : Type} [Fintype ι] (f : ι → Subgroup G) : (⨅ i, f i).relindex L ≤ ∏ i, (f i).relindex L := le_of_le_of_eq (Finite.card_le_of_embedding' (quotientiInfSubgroupOfEmbedding f L) fun h => let ⟨i, _hi, h⟩ := Finset.prod_eq_zero_iff.mp (Nat.card_pi.symm.trans h) relindex_eq_zero_of_le_left (iInf_le f i) h) Nat.card_pi @[to_additive] theorem index_iInf_ne_zero {ι : Type} [Finite ι] {f : ι → Subgroup G} (hf : ∀ i, (f i).index ≠ 0) : (⨅ i, f i).index ≠ 0 := by simp_rw [← relindex_top_right] at hf ⊢ exact relindex_iInf_ne_zero hf @[to_additive] theorem index_iInf_le {ι : Type} [Fintype ι] (f : ι → Subgroup G) : (⨅ i, f i).index ≤ ∏ i, (f i).index := by simp_rw [← relindex_top_right, relindex_iInf_le] @[to_additive (attr := simp) index_eq_one]	theorem index_eq_one : H.index = 1 ↔ H = ⊤ := ⟨fun h =>	Mathlib/GroupTheory/Index.lean	370	371
/- 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.Lattice.Prod import Mathlib.Data.Finite.Prod import Mathlib.Data.Set.Lattice.Image /-! # N-ary images of finsets This file defines `Finset.image₂`, the binary image of finsets. This is the finset version of `Set.image2`. This is mostly useful to define pointwise operations. ## Notes This file is very similar to `Data.Set.NAry`, `Order.Filter.NAry` and `Data.Option.NAry`. Please keep them in sync. We do not define `Finset.image₃` as its only purpose would be to prove properties of `Finset.image₂` and `Set.image2` already fulfills this task. -/ open Function Set variable {α α' β β' γ γ' δ δ' ε ε' ζ ζ' ν : Type} namespace Finset variable [DecidableEq α'] [DecidableEq β'] [DecidableEq γ] [DecidableEq γ'] [DecidableEq δ'] [DecidableEq ε] [DecidableEq ε'] {f f' : α → β → γ} {g g' : α → β → γ → δ} {s s' : Finset α} {t t' : Finset β} {u u' : Finset γ} {a a' : α} {b b' : β} {c : γ} /-- The image of a binary function `f : α → β → γ` as a function `Finset α → Finset β → Finset γ`. Mathematically this should be thought of as the image of the corresponding function `α × β → γ`. -/ def image₂ (f : α → β → γ) (s : Finset α) (t : Finset β) : Finset γ := (s ×ˢ t).image <\| uncurry f @[simp] theorem mem_image₂ : c ∈ image₂ f s t ↔ ∃ a ∈ s, ∃ b ∈ t, f a b = c := by simp [image₂, and_assoc] @[simp, norm_cast] theorem coe_image₂ (f : α → β → γ) (s : Finset α) (t : Finset β) : (image₂ f s t : Set γ) = Set.image2 f s t := Set.ext fun _ => mem_image₂ theorem card_image₂_le (f : α → β → γ) (s : Finset α) (t : Finset β) : #(image₂ f s t) ≤ #s #t := card_image_le.trans_eq <\| card_product _ _ theorem card_image₂_iff : #(image₂ f s t) = #s * #t ↔ (s ×ˢ t : Set (α × β)).InjOn fun x => f x.1 x.2 := by rw [← card_product, ← coe_product] exact card_image_iff theorem card_image₂ (hf : Injective2 f) (s : Finset α) (t : Finset β) : #(image₂ f s t) = #s * #t := (card_image_of_injective _ hf.uncurry).trans <\| card_product _ _ theorem mem_image₂_of_mem (ha : a ∈ s) (hb : b ∈ t) : f a b ∈ image₂ f s t := mem_image₂.2 ⟨a, ha, b, hb, rfl⟩ theorem mem_image₂_iff (hf : Injective2 f) : f a b ∈ image₂ f s t ↔ a ∈ s ∧ b ∈ t := by rw [← mem_coe, coe_image₂, mem_image2_iff hf, mem_coe, mem_coe] @[gcongr] theorem image₂_subset (hs : s ⊆ s') (ht : t ⊆ t') : image₂ f s t ⊆ image₂ f s' t' := by rw [← coe_subset, coe_image₂, coe_image₂] exact image2_subset hs ht @[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) : s.image (fun a => f a b) ⊆ image₂ f s t := image_subset_iff.2 fun _ ha => mem_image₂_of_mem ha hb theorem image_subset_image₂_right (ha : a ∈ s) : t.image (fun b => f a b) ⊆ image₂ f s t := image_subset_iff.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 simp_rw [← mem_coe, coe_image₂, forall_mem_image2] lemma exists_mem_image₂ {p : γ → Prop} : (∃ z ∈ image₂ f s t, p z) ↔ ∃ x ∈ s, ∃ y ∈ t, p (f x y) := by simp_rw [← mem_coe, coe_image₂, exists_mem_image2] @[deprecated (since := "2024-11-23")] alias forall_image₂_iff := forall_mem_image₂ @[simp] theorem image₂_subset_iff : 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, (t.image fun b => f a b) ⊆ u := by simp_rw [image₂_subset_iff, image_subset_iff] theorem image₂_subset_iff_right : image₂ f s t ⊆ u ↔ ∀ b ∈ t, (s.image fun a => f a b) ⊆ u := by simp_rw [image₂_subset_iff, image_subset_iff, @forall₂_swap α] @[simp] theorem image₂_nonempty_iff : (image₂ f s t).Nonempty ↔ s.Nonempty ∧ t.Nonempty := by rw [← coe_nonempty, coe_image₂] exact image2_nonempty_iff @[aesop safe apply (rule_sets := [finsetNonempty])] theorem Nonempty.image₂ (hs : s.Nonempty) (ht : t.Nonempty) : (image₂ f s t).Nonempty := image₂_nonempty_iff.2 ⟨hs, ht⟩ theorem Nonempty.of_image₂_left (h : (s.image₂ f t).Nonempty) : s.Nonempty := (image₂_nonempty_iff.1 h).1 theorem Nonempty.of_image₂_right (h : (s.image₂ f t).Nonempty) : t.Nonempty := (image₂_nonempty_iff.1 h).2 @[simp] theorem image₂_empty_left : image₂ f ∅ t = ∅ := coe_injective <\| by simp @[simp] theorem image₂_empty_right : image₂ f s ∅ = ∅ := coe_injective <\| by simp @[simp] theorem image₂_eq_empty_iff : image₂ f s t = ∅ ↔ s = ∅ ∨ t = ∅ := by simp_rw [← not_nonempty_iff_eq_empty, image₂_nonempty_iff, not_and_or] @[simp] theorem image₂_singleton_left : image₂ f {a} t = t.image fun b => f a b := ext fun x => by simp @[simp] theorem image₂_singleton_right : image₂ f s {b} = s.image fun a => f a b := ext fun x => by simp theorem image₂_singleton_left' : image₂ f {a} t = t.image (f a) := image₂_singleton_left theorem image₂_singleton : image₂ f {a} {b} = {f a b} := by simp theorem image₂_union_left [DecidableEq α] : image₂ f (s ∪ s') t = image₂ f s t ∪ image₂ f s' t := coe_injective <\| by push_cast exact image2_union_left theorem image₂_union_right [DecidableEq β] : image₂ f s (t ∪ t') = image₂ f s t ∪ image₂ f s t' := coe_injective <\| by push_cast exact image2_union_right @[simp] theorem image₂_insert_left [DecidableEq α] : image₂ f (insert a s) t = (t.image fun b => f a b) ∪ image₂ f s t := coe_injective <\| by push_cast exact image2_insert_left @[simp] theorem image₂_insert_right [DecidableEq β] : image₂ f s (insert b t) = (s.image fun a => f a b) ∪ image₂ f s t := coe_injective <\| by push_cast exact image2_insert_right theorem image₂_inter_left [DecidableEq α] (hf : Injective2 f) : image₂ f (s ∩ s') t = image₂ f s t ∩ image₂ f s' t := coe_injective <\| by push_cast exact image2_inter_left hf theorem image₂_inter_right [DecidableEq β] (hf : Injective2 f) : image₂ f s (t ∩ t') = image₂ f s t ∩ image₂ f s t' := coe_injective <\| by push_cast exact image2_inter_right hf theorem image₂_inter_subset_left [DecidableEq α] : image₂ f (s ∩ s') t ⊆ image₂ f s t ∩ image₂ f s' t := coe_subset.1 <\| by push_cast exact image2_inter_subset_left theorem image₂_inter_subset_right [DecidableEq β] : image₂ f s (t ∩ t') ⊆ image₂ f s t ∩ image₂ f s t' := coe_subset.1 <\| by push_cast exact image2_inter_subset_right theorem image₂_congr (h : ∀ a ∈ s, ∀ b ∈ t, f a b = f' a b) : image₂ f s t = image₂ f' s t := coe_injective <\| by push_cast exact image2_congr h /-- 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 variable (s t) theorem card_image₂_singleton_left (hf : Injective (f a)) : #(image₂ f {a} t) = #t := by rw [image₂_singleton_left, card_image_of_injective _ hf] theorem card_image₂_singleton_right (hf : Injective fun a => f a b) : #(image₂ f s {b}) = #s := by rw [image₂_singleton_right, card_image_of_injective _ hf] theorem image₂_singleton_inter [DecidableEq β] (t₁ t₂ : Finset β) (hf : Injective (f a)) : image₂ f {a} (t₁ ∩ t₂) = image₂ f {a} t₁ ∩ image₂ f {a} t₂ := by simp_rw [image₂_singleton_left, image_inter _ _ hf] theorem image₂_inter_singleton [DecidableEq α] (s₁ s₂ : Finset α) (hf : Injective fun a => f a b) : image₂ f (s₁ ∩ s₂) {b} = image₂ f s₁ {b} ∩ image₂ f s₂ {b} := by simp_rw [image₂_singleton_right, image_inter _ _ hf] theorem card_le_card_image₂_left {s : Finset α} (hs : s.Nonempty) (hf : ∀ a, Injective (f a)) : #t ≤ #(image₂ f s t) := by obtain ⟨a, ha⟩ := hs rw [← card_image₂_singleton_left _ (hf a)] exact card_le_card (image₂_subset_right <\| singleton_subset_iff.2 ha) theorem card_le_card_image₂_right {t : Finset β} (ht : t.Nonempty) (hf : ∀ b, Injective fun a => f a b) : #s ≤ #(image₂ f s t) := by obtain ⟨b, hb⟩ := ht rw [← card_image₂_singleton_right _ (hf b)] exact card_le_card (image₂_subset_left <\| singleton_subset_iff.2 hb) variable {s t} theorem biUnion_image_left : (s.biUnion fun a => t.image <\| f a) = image₂ f s t := coe_injective <\| by push_cast exact Set.iUnion_image_left _ theorem biUnion_image_right : (t.biUnion fun b => s.image fun a => f a b) = image₂ f s t := coe_injective <\| by push_cast exact Set.iUnion_image_right _ /-! ### Algebraic replacement rules A collection of lemmas to transfer associativity, commutativity, distributivity, ... of operations to the associativity, commutativity, distributivity, ... of `Finset.image₂` of those operations. The proof pattern is `image₂_lemma operation_lemma`. For example, `image₂_comm mul_comm` proves that `image₂ () f g = image₂ () g f` in a `CommSemigroup`. -/	section variable [DecidableEq δ] theorem image_image₂ (f : α → β → γ) (g : γ → δ) :	Mathlib/Data/Finset/NAry.lean	253	257
/- Copyright (c) 2015 Microsoft Corporation. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Leonardo de Moura, Jeremy Avigad, Minchao Wu, Mario Carneiro -/ import Mathlib.Data.Finset.Attach import Mathlib.Data.Finset.Disjoint import Mathlib.Data.Finset.Erase import Mathlib.Data.Finset.Filter import Mathlib.Data.Finset.Range import Mathlib.Data.Finset.SDiff import Mathlib.Data.Multiset.Basic import Mathlib.Logic.Equiv.Set import Mathlib.Order.Directed import Mathlib.Order.Interval.Set.Defs import Mathlib.Data.Set.SymmDiff /-! # Basic lemmas on finite sets This file contains lemmas on the interaction of various definitions on the `Finset` type. For an explanation of `Finset` design decisions, please see `Mathlib/Data/Finset/Defs.lean`. ## Main declarations ### Main definitions * `Finset.choose`: Given a proof `h` of existence and uniqueness of a certain element satisfying a predicate, `choose s h` returns the element of `s` satisfying that predicate. ### Equivalences between finsets * The `Mathlib/Logic/Equiv/Defs.lean` file describes a general type of equivalence, so look in there for any lemmas. There is some API for rewriting sums and products from `s` to `t` given that `s ≃ t`. TODO: examples ## Tags finite sets, finset -/ -- Assert that we define `Finset` without the material on `List.sublists`. -- Note that we cannot use `List.sublists` itself as that is defined very early. assert_not_exists List.sublistsLen Multiset.powerset CompleteLattice Monoid open Multiset Subtype Function universe u variable {α : Type} {β : Type} {γ : Type} namespace Finset -- TODO: these should be global attributes, but this will require fixing other files attribute [local trans] Subset.trans Superset.trans set_option linter.deprecated false in @[deprecated "Deprecated without replacement." (since := "2025-02-07")] theorem sizeOf_lt_sizeOf_of_mem [SizeOf α] {x : α} {s : Finset α} (hx : x ∈ s) : SizeOf.sizeOf x < SizeOf.sizeOf s := by cases s dsimp [SizeOf.sizeOf, SizeOf.sizeOf, Multiset.sizeOf] rw [Nat.add_comm] refine lt_trans ?_ (Nat.lt_succ_self _) exact Multiset.sizeOf_lt_sizeOf_of_mem hx /-! ### Lattice structure -/ section Lattice variable [DecidableEq α] {s s₁ s₂ t t₁ t₂ u v : Finset α} {a b : α} /-! #### union -/ @[simp] theorem disjUnion_eq_union (s t h) : @disjUnion α s t h = s ∪ t := ext fun a => by simp @[simp] theorem disjoint_union_left : Disjoint (s ∪ t) u ↔ Disjoint s u ∧ Disjoint t u := by simp only [disjoint_left, mem_union, or_imp, forall_and] @[simp] theorem disjoint_union_right : Disjoint s (t ∪ u) ↔ Disjoint s t ∧ Disjoint s u := by simp only [disjoint_right, mem_union, or_imp, forall_and] /-! #### inter -/ theorem not_disjoint_iff_nonempty_inter : ¬Disjoint s t ↔ (s ∩ t).Nonempty := not_disjoint_iff.trans <\| by simp [Finset.Nonempty] alias ⟨_, Nonempty.not_disjoint⟩ := not_disjoint_iff_nonempty_inter theorem disjoint_or_nonempty_inter (s t : Finset α) : Disjoint s t ∨ (s ∩ t).Nonempty := by rw [← not_disjoint_iff_nonempty_inter] exact em _ omit [DecidableEq α] in theorem disjoint_of_subset_iff_left_eq_empty (h : s ⊆ t) : Disjoint s t ↔ s = ∅ := disjoint_of_le_iff_left_eq_bot h lemma pairwiseDisjoint_iff {ι : Type} {s : Set ι} {f : ι → Finset α} : s.PairwiseDisjoint f ↔ ∀ ⦃i⦄, i ∈ s → ∀ ⦃j⦄, j ∈ s → (f i ∩ f j).Nonempty → i = j := by simp [Set.PairwiseDisjoint, Set.Pairwise, Function.onFun, not_imp_comm (a := _ = _), not_disjoint_iff_nonempty_inter] end Lattice instance isDirected_le : IsDirected (Finset α) (· ≤ ·) := by classical infer_instance instance isDirected_subset : IsDirected (Finset α) (· ⊆ ·) := isDirected_le /-! ### erase -/ section Erase variable [DecidableEq α] {s t u v : Finset α} {a b : α} @[simp] theorem erase_empty (a : α) : erase ∅ a = ∅ := rfl protected lemma Nontrivial.erase_nonempty (hs : s.Nontrivial) : (s.erase a).Nonempty := (hs.exists_ne a).imp <\| by aesop @[simp] lemma erase_nonempty (ha : a ∈ s) : (s.erase a).Nonempty ↔ s.Nontrivial := by simp only [Finset.Nonempty, mem_erase, and_comm (b := _ ∈ _)] refine ⟨?_, fun hs ↦ hs.exists_ne a⟩ rintro ⟨b, hb, hba⟩ exact ⟨_, hb, _, ha, hba⟩ @[simp] theorem erase_singleton (a : α) : ({a} : Finset α).erase a = ∅ := by ext x simp @[simp] theorem erase_insert_eq_erase (s : Finset α) (a : α) : (insert a s).erase a = s.erase a := ext fun x => by simp +contextual only [mem_erase, mem_insert, and_congr_right_iff, false_or, iff_self, imp_true_iff] theorem erase_insert {a : α} {s : Finset α} (h : a ∉ s) : erase (insert a s) a = s := by rw [erase_insert_eq_erase, erase_eq_of_not_mem h] theorem erase_insert_of_ne {a b : α} {s : Finset α} (h : a ≠ b) : erase (insert a s) b = insert a (erase s b) := ext fun x => by have : x ≠ b ∧ x = a ↔ x = a := and_iff_right_of_imp fun hx => hx.symm ▸ h simp only [mem_erase, mem_insert, and_or_left, this] theorem erase_cons_of_ne {a b : α} {s : Finset α} (ha : a ∉ s) (hb : a ≠ b) : erase (cons a s ha) b = cons a (erase s b) fun h => ha <\| erase_subset _ _ h := by simp only [cons_eq_insert, erase_insert_of_ne hb] @[simp] theorem insert_erase (h : a ∈ s) : insert a (erase s a) = s := ext fun x => by simp only [mem_insert, mem_erase, or_and_left, dec_em, true_and] apply or_iff_right_of_imp rintro rfl exact h lemma erase_eq_iff_eq_insert (hs : a ∈ s) (ht : a ∉ t) : erase s a = t ↔ s = insert a t := by aesop lemma insert_erase_invOn : Set.InvOn (insert a) (fun s ↦ erase s a) {s : Finset α \| a ∈ s} {s : Finset α \| a ∉ s} := ⟨fun _s ↦ insert_erase, fun _s ↦ erase_insert⟩ theorem erase_ssubset {a : α} {s : Finset α} (h : a ∈ s) : s.erase a ⊂ s := calc s.erase a ⊂ insert a (s.erase a) := ssubset_insert <\| not_mem_erase _ _ _ = _ := insert_erase h theorem ssubset_iff_exists_subset_erase {s t : Finset α} : s ⊂ t ↔ ∃ a ∈ t, s ⊆ t.erase a := by refine ⟨fun h => ?_, fun ⟨a, ha, h⟩ => ssubset_of_subset_of_ssubset h <\| erase_ssubset ha⟩ obtain ⟨a, ht, hs⟩ := not_subset.1 h.2 exact ⟨a, ht, subset_erase.2 ⟨h.1, hs⟩⟩ theorem erase_ssubset_insert (s : Finset α) (a : α) : s.erase a ⊂ insert a s := ssubset_iff_exists_subset_erase.2 ⟨a, mem_insert_self _ _, erase_subset_erase _ <\| subset_insert _ _⟩ theorem erase_cons {s : Finset α} {a : α} (h : a ∉ s) : (s.cons a h).erase a = s := by rw [cons_eq_insert, erase_insert_eq_erase, erase_eq_of_not_mem h] theorem subset_insert_iff {a : α} {s t : Finset α} : s ⊆ insert a t ↔ erase s a ⊆ t := by simp only [subset_iff, or_iff_not_imp_left, mem_erase, mem_insert, and_imp] exact forall_congr' fun x => forall_swap theorem erase_insert_subset (a : α) (s : Finset α) : erase (insert a s) a ⊆ s := subset_insert_iff.1 <\| Subset.rfl theorem insert_erase_subset (a : α) (s : Finset α) : s ⊆ insert a (erase s a) := subset_insert_iff.2 <\| Subset.rfl theorem subset_insert_iff_of_not_mem (h : a ∉ s) : s ⊆ insert a t ↔ s ⊆ t := by rw [subset_insert_iff, erase_eq_of_not_mem h] theorem erase_subset_iff_of_mem (h : a ∈ t) : s.erase a ⊆ t ↔ s ⊆ t := by rw [← subset_insert_iff, insert_eq_of_mem h] theorem erase_injOn' (a : α) : { s : Finset α \| a ∈ s }.InjOn fun s => erase s a := fun s hs t ht (h : s.erase a = _) => by rw [← insert_erase hs, ← insert_erase ht, h] end Erase lemma Nontrivial.exists_cons_eq {s : Finset α} (hs : s.Nontrivial) : ∃ t a ha b hb hab, (cons b t hb).cons a (mem_cons.not.2 <\| not_or_intro hab ha) = s := by classical obtain ⟨a, ha, b, hb, hab⟩ := hs have : b ∈ s.erase a := mem_erase.2 ⟨hab.symm, hb⟩ refine ⟨(s.erase a).erase b, a, ?_, b, ?_, ?_, ?_⟩ <;> simp [insert_erase this, insert_erase ha, ] /-! ### sdiff -/ section Sdiff variable [DecidableEq α] {s t u v : Finset α} {a b : α} lemma erase_sdiff_erase (hab : a ≠ b) (hb : b ∈ s) : s.erase a \ s.erase b = {b} := by ext; aesop -- TODO: Do we want to delete this lemma and `Finset.disjUnion_singleton`, -- or instead add `Finset.union_singleton`/`Finset.singleton_union`? theorem sdiff_singleton_eq_erase (a : α) (s : Finset α) : s \ {a} = erase s a := by ext rw [mem_erase, mem_sdiff, mem_singleton, and_comm] -- This lemma matches `Finset.insert_eq` in functionality. theorem erase_eq (s : Finset α) (a : α) : s.erase a = s \ {a} := (sdiff_singleton_eq_erase _ _).symm theorem disjoint_erase_comm : Disjoint (s.erase a) t ↔ Disjoint s (t.erase a) := by simp_rw [erase_eq, disjoint_sdiff_comm] lemma disjoint_insert_erase (ha : a ∉ t) : Disjoint (s.erase a) (insert a t) ↔ Disjoint s t := by rw [disjoint_erase_comm, erase_insert ha] lemma disjoint_erase_insert (ha : a ∉ s) : Disjoint (insert a s) (t.erase a) ↔ Disjoint s t := by rw [← disjoint_erase_comm, erase_insert ha] theorem disjoint_of_erase_left (ha : a ∉ t) (hst : Disjoint (s.erase a) t) : Disjoint s t := by rw [← erase_insert ha, ← disjoint_erase_comm, disjoint_insert_right] exact ⟨not_mem_erase _ _, hst⟩ theorem disjoint_of_erase_right (ha : a ∉ s) (hst : Disjoint s (t.erase a)) : Disjoint s t := by rw [← erase_insert ha, disjoint_erase_comm, disjoint_insert_left] exact ⟨not_mem_erase _ _, hst⟩ theorem inter_erase (a : α) (s t : Finset α) : s ∩ t.erase a = (s ∩ t).erase a := by simp only [erase_eq, inter_sdiff_assoc] @[simp] theorem erase_inter (a : α) (s t : Finset α) : s.erase a ∩ t = (s ∩ t).erase a := by simpa only [inter_comm t] using inter_erase a t s theorem erase_sdiff_comm (s t : Finset α) (a : α) : s.erase a \ t = (s \ t).erase a := by simp_rw [erase_eq, sdiff_right_comm] theorem erase_inter_comm (s t : Finset α) (a : α) : s.erase a ∩ t = s ∩ t.erase a := by rw [erase_inter, inter_erase] theorem erase_union_distrib (s t : Finset α) (a : α) : (s ∪ t).erase a = s.erase a ∪ t.erase a := by simp_rw [erase_eq, union_sdiff_distrib] theorem insert_inter_distrib (s t : Finset α) (a : α) : insert a (s ∩ t) = insert a s ∩ insert a t := by simp_rw [insert_eq, union_inter_distrib_left] theorem erase_sdiff_distrib (s t : Finset α) (a : α) : (s \ t).erase a = s.erase a \ t.erase a := by simp_rw [erase_eq, sdiff_sdiff, sup_sdiff_eq_sup le_rfl, sup_comm] theorem erase_union_of_mem (ha : a ∈ t) (s : Finset α) : s.erase a ∪ t = s ∪ t := by rw [← insert_erase (mem_union_right s ha), erase_union_distrib, ← union_insert, insert_erase ha] theorem union_erase_of_mem (ha : a ∈ s) (t : Finset α) : s ∪ t.erase a = s ∪ t := by rw [← insert_erase (mem_union_left t ha), erase_union_distrib, ← insert_union, insert_erase ha] theorem sdiff_union_erase_cancel (hts : t ⊆ s) (ha : a ∈ t) : s \ t ∪ t.erase a = s.erase a := by simp_rw [erase_eq, sdiff_union_sdiff_cancel hts (singleton_subset_iff.2 ha)] theorem sdiff_insert (s t : Finset α) (x : α) : s \ insert x t = (s \ t).erase x := by simp_rw [← sdiff_singleton_eq_erase, insert_eq, sdiff_sdiff_left', sdiff_union_distrib, inter_comm] theorem sdiff_insert_insert_of_mem_of_not_mem {s t : Finset α} {x : α} (hxs : x ∈ s) (hxt : x ∉ t) : insert x (s \ insert x t) = s \ t := by rw [sdiff_insert, insert_erase (mem_sdiff.mpr ⟨hxs, hxt⟩)] theorem sdiff_erase (h : a ∈ s) : s \ t.erase a = insert a (s \ t) := by rw [← sdiff_singleton_eq_erase, sdiff_sdiff_eq_sdiff_union (singleton_subset_iff.2 h), insert_eq, union_comm] theorem sdiff_erase_self (ha : a ∈ s) : s \ s.erase a = {a} := by rw [sdiff_erase ha, Finset.sdiff_self, insert_empty_eq] theorem erase_eq_empty_iff (s : Finset α) (a : α) : s.erase a = ∅ ↔ s = ∅ ∨ s = {a} := by rw [← sdiff_singleton_eq_erase, sdiff_eq_empty_iff_subset, subset_singleton_iff] --TODO@Yaël: Kill lemmas duplicate with `BooleanAlgebra` theorem sdiff_disjoint : Disjoint (t \ s) s := disjoint_left.2 fun _a ha => (mem_sdiff.1 ha).2 theorem disjoint_sdiff : Disjoint s (t \ s) := sdiff_disjoint.symm theorem disjoint_sdiff_inter (s t : Finset α) : Disjoint (s \ t) (s ∩ t) := disjoint_of_subset_right inter_subset_right sdiff_disjoint end Sdiff /-! ### attach -/ @[simp] theorem attach_empty : attach (∅ : Finset α) = ∅ := rfl @[simp] theorem attach_nonempty_iff {s : Finset α} : s.attach.Nonempty ↔ s.Nonempty := by simp [Finset.Nonempty] @[aesop safe apply (rule_sets := [finsetNonempty])] protected alias ⟨_, Nonempty.attach⟩ := attach_nonempty_iff @[simp] theorem attach_eq_empty_iff {s : Finset α} : s.attach = ∅ ↔ s = ∅ := by simp [eq_empty_iff_forall_not_mem] /-! ### filter -/ section Filter variable (p q : α → Prop) [DecidablePred p] [DecidablePred q] {s t : Finset α} theorem filter_singleton (a : α) : filter p {a} = if p a then {a} else ∅ := by classical ext x simp only [mem_singleton, forall_eq, mem_filter] split_ifs with h <;> by_cases h' : x = a <;> simp [h, h'] theorem filter_cons_of_pos (a : α) (s : Finset α) (ha : a ∉ s) (hp : p a) : filter p (cons a s ha) = cons a (filter p s) ((mem_of_mem_filter _).mt ha) := eq_of_veq <\| Multiset.filter_cons_of_pos s.val hp theorem filter_cons_of_neg (a : α) (s : Finset α) (ha : a ∉ s) (hp : ¬p a) : filter p (cons a s ha) = filter p s := eq_of_veq <\| Multiset.filter_cons_of_neg s.val hp theorem disjoint_filter {s : Finset α} {p q : α → Prop} [DecidablePred p] [DecidablePred q] : Disjoint (s.filter p) (s.filter q) ↔ ∀ x ∈ s, p x → ¬q x := by constructor <;> simp +contextual [disjoint_left] theorem disjoint_filter_filter' (s t : Finset α) {p q : α → Prop} [DecidablePred p] [DecidablePred q] (h : Disjoint p q) : Disjoint (s.filter p) (t.filter q) := by simp_rw [disjoint_left, mem_filter] rintro a ⟨_, hp⟩ ⟨_, hq⟩ rw [Pi.disjoint_iff] at h simpa [hp, hq] using h a theorem disjoint_filter_filter_neg (s t : Finset α) (p : α → Prop) [DecidablePred p] [∀ x, Decidable (¬p x)] : Disjoint (s.filter p) (t.filter fun a => ¬p a) := disjoint_filter_filter' s t disjoint_compl_right theorem filter_disj_union (s : Finset α) (t : Finset α) (h : Disjoint s t) : filter p (disjUnion s t h) = (filter p s).disjUnion (filter p t) (disjoint_filter_filter h) := eq_of_veq <\| Multiset.filter_add _ _ _ theorem filter_cons {a : α} (s : Finset α) (ha : a ∉ s) : filter p (cons a s ha) = if p a then cons a (filter p s) ((mem_of_mem_filter _).mt ha) else filter p s := by split_ifs with h · rw [filter_cons_of_pos _ _ _ ha h] · rw [filter_cons_of_neg _ _ _ ha h] section variable [DecidableEq α] theorem filter_union (s₁ s₂ : Finset α) : (s₁ ∪ s₂).filter p = s₁.filter p ∪ s₂.filter p := ext fun _ => by simp only [mem_filter, mem_union, or_and_right] theorem filter_union_right (s : Finset α) : s.filter p ∪ s.filter q = s.filter fun x => p x ∨ q x := ext fun x => by simp [mem_filter, mem_union, ← and_or_left] theorem filter_mem_eq_inter {s t : Finset α} [∀ i, Decidable (i ∈ t)] : (s.filter fun i => i ∈ t) = s ∩ t := ext fun i => by simp [mem_filter, mem_inter] theorem filter_inter_distrib (s t : Finset α) : (s ∩ t).filter p = s.filter p ∩ t.filter p := by ext simp [mem_filter, mem_inter, and_assoc] theorem filter_inter (s t : Finset α) : filter p s ∩ t = filter p (s ∩ t) := by ext simp only [mem_inter, mem_filter, and_right_comm] theorem inter_filter (s t : Finset α) : s ∩ filter p t = filter p (s ∩ t) := by rw [inter_comm, filter_inter, inter_comm] theorem filter_insert (a : α) (s : Finset α) : filter p (insert a s) = if p a then insert a (filter p s) else filter p s := by ext x split_ifs with h <;> by_cases h' : x = a <;> simp [h, h'] theorem filter_erase (a : α) (s : Finset α) : filter p (erase s a) = erase (filter p s) a := by ext x simp only [and_assoc, mem_filter, iff_self, mem_erase] theorem filter_or (s : Finset α) : (s.filter fun a => p a ∨ q a) = s.filter p ∪ s.filter q := ext fun _ => by simp [mem_filter, mem_union, and_or_left] theorem filter_and (s : Finset α) : (s.filter fun a => p a ∧ q a) = s.filter p ∩ s.filter q := ext fun _ => by simp [mem_filter, mem_inter, and_comm, and_left_comm, and_self_iff, and_assoc] theorem filter_not (s : Finset α) : (s.filter fun a => ¬p a) = s \ s.filter p := ext fun a => by simp only [Bool.decide_coe, Bool.not_eq_true', mem_filter, and_comm, mem_sdiff, not_and_or, Bool.not_eq_true, and_or_left, and_not_self, or_false] lemma filter_and_not (s : Finset α) (p q : α → Prop) [DecidablePred p] [DecidablePred q] : s.filter (fun a ↦ p a ∧ ¬ q a) = s.filter p \ s.filter q := by rw [filter_and, filter_not, ← inter_sdiff_assoc, inter_eq_left.2 (filter_subset _ _)] theorem sdiff_eq_filter (s₁ s₂ : Finset α) : s₁ \ s₂ = filter (· ∉ s₂) s₁ := ext fun _ => by simp [mem_sdiff, mem_filter] theorem subset_union_elim {s : Finset α} {t₁ t₂ : Set α} (h : ↑s ⊆ t₁ ∪ t₂) : ∃ s₁ s₂ : Finset α, s₁ ∪ s₂ = s ∧ ↑s₁ ⊆ t₁ ∧ ↑s₂ ⊆ t₂ \ t₁ := by classical refine ⟨s.filter (· ∈ t₁), s.filter (· ∉ t₁), ?_, ?_, ?_⟩ · simp [filter_union_right, em] · intro x simp · intro x simp only [not_not, coe_filter, Set.mem_setOf_eq, Set.mem_diff, and_imp] intro hx hx₂ exact ⟨Or.resolve_left (h hx) hx₂, hx₂⟩ -- This is not a good simp lemma, as it would prevent `Finset.mem_filter` from firing -- on, e.g. `x ∈ s.filter (Eq b)`. /-- After filtering out everything that does not equal a given value, at most that value remains. This is equivalent to `filter_eq'` with the equality the other way. -/ theorem filter_eq [DecidableEq β] (s : Finset β) (b : β) : s.filter (Eq b) = ite (b ∈ s) {b} ∅ := by split_ifs with h · ext simp only [mem_filter, mem_singleton, decide_eq_true_eq] refine ⟨fun h => h.2.symm, ?_⟩ rintro rfl exact ⟨h, rfl⟩ · ext simp only [mem_filter, not_and, iff_false, not_mem_empty, decide_eq_true_eq] rintro m rfl exact h m /-- After filtering out everything that does not equal a given value, at most that value remains. This is equivalent to `filter_eq` with the equality the other way. -/ theorem filter_eq' [DecidableEq β] (s : Finset β) (b : β) : (s.filter fun a => a = b) = ite (b ∈ s) {b} ∅ := _root_.trans (filter_congr fun _ _ => by simp_rw [@eq_comm _ b]) (filter_eq s b) theorem filter_ne [DecidableEq β] (s : Finset β) (b : β) : (s.filter fun a => b ≠ a) = s.erase b := by ext simp only [mem_filter, mem_erase, Ne, decide_not, Bool.not_eq_true', decide_eq_false_iff_not] tauto theorem filter_ne' [DecidableEq β] (s : Finset β) (b : β) : (s.filter fun a => a ≠ b) = s.erase b := _root_.trans (filter_congr fun _ _ => by simp_rw [@ne_comm _ b]) (filter_ne s b) theorem filter_union_filter_of_codisjoint (s : Finset α) (h : Codisjoint p q) : s.filter p ∪ s.filter q = s := (filter_or _ _ _).symm.trans <\| filter_true_of_mem fun x _ => h.top_le x trivial theorem filter_union_filter_neg_eq [∀ x, Decidable (¬p x)] (s : Finset α) : (s.filter p ∪ s.filter fun a => ¬p a) = s := filter_union_filter_of_codisjoint _ _ _ <\| @codisjoint_hnot_right _ _ p end end Filter /-! ### range -/ section Range open Nat variable {n m l : ℕ} @[simp] theorem range_filter_eq {n m : ℕ} : (range n).filter (· = m) = if m < n then {m} else ∅ := by convert filter_eq (range n) m using 2 · ext rw [eq_comm] · simp end Range end Finset /-! ### dedup on list and multiset -/ namespace Multiset variable [DecidableEq α] {s t : Multiset α} @[simp] theorem toFinset_add (s t : Multiset α) : toFinset (s + t) = toFinset s ∪ toFinset t := Finset.ext <\| by simp @[simp] theorem toFinset_inter (s t : Multiset α) : toFinset (s ∩ t) = toFinset s ∩ toFinset t := Finset.ext <\| by simp @[simp] theorem toFinset_union (s t : Multiset α) : (s ∪ t).toFinset = s.toFinset ∪ t.toFinset := by ext; simp @[simp] theorem toFinset_eq_empty {m : Multiset α} : m.toFinset = ∅ ↔ m = 0 := Finset.val_inj.symm.trans Multiset.dedup_eq_zero @[simp] theorem toFinset_nonempty : s.toFinset.Nonempty ↔ s ≠ 0 := by simp only [toFinset_eq_empty, Ne, Finset.nonempty_iff_ne_empty] @[aesop safe apply (rule_sets := [finsetNonempty])] protected alias ⟨_, Aesop.toFinset_nonempty_of_ne⟩ := toFinset_nonempty @[simp] theorem toFinset_filter (s : Multiset α) (p : α → Prop) [DecidablePred p] : Multiset.toFinset (s.filter p) = s.toFinset.filter p := by ext; simp end Multiset namespace List variable [DecidableEq α] {l l' : List α} {a : α} {f : α → β} {s : Finset α} {t : Set β} {t' : Finset β} @[simp] theorem toFinset_union (l l' : List α) : (l ∪ l').toFinset = l.toFinset ∪ l'.toFinset := by ext simp @[simp] theorem toFinset_inter (l l' : List α) : (l ∩ l').toFinset = l.toFinset ∩ l'.toFinset := by ext simp @[aesop safe apply (rule_sets := [finsetNonempty])] alias ⟨_, Aesop.toFinset_nonempty_of_ne⟩ := toFinset_nonempty_iff @[simp] theorem toFinset_filter (s : List α) (p : α → Bool) : (s.filter p).toFinset = s.toFinset.filter (p ·) := by ext; simp [List.mem_filter] end List namespace Finset section ToList @[simp] theorem toList_eq_nil {s : Finset α} : s.toList = [] ↔ s = ∅ := Multiset.toList_eq_nil.trans val_eq_zero theorem empty_toList {s : Finset α} : s.toList.isEmpty ↔ s = ∅ := by simp @[simp] theorem toList_empty : (∅ : Finset α).toList = [] := toList_eq_nil.mpr rfl theorem Nonempty.toList_ne_nil {s : Finset α} (hs : s.Nonempty) : s.toList ≠ [] := mt toList_eq_nil.mp hs.ne_empty theorem Nonempty.not_empty_toList {s : Finset α} (hs : s.Nonempty) : ¬s.toList.isEmpty := mt empty_toList.mp hs.ne_empty end ToList /-! ### choose -/ section Choose variable (p : α → Prop) [DecidablePred p] (l : Finset α) /-- Given a finset `l` and a predicate `p`, associate to a proof that there is a unique element of `l` satisfying `p` this unique element, as an element of the corresponding subtype. -/ def chooseX (hp : ∃! a, a ∈ l ∧ p a) : { a // a ∈ l ∧ p a } := Multiset.chooseX p l.val hp /-- Given a finset `l` and a predicate `p`, associate to a proof that there is a unique element of `l` satisfying `p` this unique element, as an element of the ambient type. -/ def choose (hp : ∃! a, a ∈ l ∧ p a) : α := chooseX p l hp theorem choose_spec (hp : ∃! a, a ∈ l ∧ p a) : choose p l hp ∈ l ∧ p (choose p l hp) := (chooseX p l hp).property theorem choose_mem (hp : ∃! a, a ∈ l ∧ p a) : choose p l hp ∈ l := (choose_spec _ _ _).1 theorem choose_property (hp : ∃! a, a ∈ l ∧ p a) : p (choose p l hp) := (choose_spec _ _ _).2 end Choose end Finset namespace Equiv variable [DecidableEq α] {s t : Finset α} open Finset /-- The disjoint union of finsets is a sum -/ def Finset.union (s t : Finset α) (h : Disjoint s t) : s ⊕ t ≃ (s ∪ t : Finset α) := Equiv.setCongr (coe_union _ _) \|>.trans (Equiv.Set.union (disjoint_coe.mpr h)) \|>.symm @[simp] theorem Finset.union_symm_inl (h : Disjoint s t) (x : s) : Equiv.Finset.union s t h (Sum.inl x) = ⟨x, Finset.mem_union.mpr <\| Or.inl x.2⟩ := rfl @[simp] theorem Finset.union_symm_inr (h : Disjoint s t) (y : t) : Equiv.Finset.union s t h (Sum.inr y) = ⟨y, Finset.mem_union.mpr <\| Or.inr y.2⟩ := rfl /-- The type of dependent functions on the disjoint union of finsets `s ∪ t` is equivalent to the type of pairs of functions on `s` and on `t`. This is similar to `Equiv.sumPiEquivProdPi`. -/ def piFinsetUnion {ι} [DecidableEq ι] (α : ι → Type) {s t : Finset ι} (h : Disjoint s t) : ((∀ i : s, α i) × ∀ i : t, α i) ≃ ∀ i : (s ∪ t : Finset ι), α i := let e := Equiv.Finset.union s t h sumPiEquivProdPi (fun b ↦ α (e b)) \|>.symm.trans (.piCongrLeft (fun i : ↥(s ∪ t) ↦ α i) e) /-- A finset is equivalent to its coercion as a set. -/ def _root_.Finset.equivToSet (s : Finset α) : s ≃ s.toSet where toFun a := ⟨a.1, mem_coe.2 a.2⟩ invFun a := ⟨a.1, mem_coe.1 a.2⟩ left_inv := fun _ ↦ rfl right_inv := fun _ ↦ rfl end Equiv namespace Multiset variable [DecidableEq α] @[simp] lemma toFinset_replicate (n : ℕ) (a : α) : (replicate n a).toFinset = if n = 0 then ∅ else {a} := by ext x simp only [mem_toFinset, Finset.mem_singleton, mem_replicate] split_ifs with hn <;> simp [hn] end Multiset		Mathlib/Data/Finset/Basic.lean	1,685	1,689
/- Copyright (c) 2024 David Loeffler. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: David Loeffler -/ import Mathlib.NumberTheory.LSeries.RiemannZeta import Mathlib.NumberTheory.Harmonic.GammaDeriv /-! # Asymptotics of `ζ s` as `s → 1` The goal of this file is to evaluate the limit of `ζ s - 1 / (s - 1)` as `s → 1`. ### Main results * `tendsto_riemannZeta_sub_one_div`: the limit of `ζ s - 1 / (s - 1)`, at the filter of punctured neighbourhoods of 1 in `ℂ`, exists and is equal to the Euler-Mascheroni constant `γ`. * `riemannZeta_one_ne_zero`: with our definition of `ζ 1` (which is characterised as the limit of `ζ s - 1 / (s - 1) / Gammaℝ s` as `s → 1`), we have `ζ 1 ≠ 0`. ### Outline of arguments We consider the sum `F s = ∑' n : ℕ, f (n + 1) s`, where `s` is a real variable and `f n s = ∫ x in n..(n + 1), (x - n) / x ^ (s + 1)`. We show that `F s` is continuous on `[1, ∞)`, that `F 1 = 1 - γ`, and that `F s = 1 / (s - 1) - ζ s / s` for `1 < s`. By combining these formulae, one deduces that the limit of `ζ s - 1 / (s - 1)` at `𝓝[>] (1 : ℝ)` exists and is equal to `γ`. Finally, using this and the Riemann removable singularity criterion we obtain the limit along punctured neighbourhoods of 1 in `ℂ`. -/ open Real Set MeasureTheory Filter Topology @[inherit_doc] local notation "γ" => eulerMascheroniConstant namespace ZetaAsymptotics -- since the intermediate lemmas are of little interest in themselves we put them in a namespace /-! ## Definitions -/ /-- Auxiliary function used in studying zeta-function asymptotics. -/ noncomputable def term (n : ℕ) (s : ℝ) : ℝ := ∫ x : ℝ in n..(n + 1), (x - n) / x ^ (s + 1) /-- Sum of finitely many `term`s. -/ noncomputable def term_sum (s : ℝ) (N : ℕ) : ℝ := ∑ n ∈ Finset.range N, term (n + 1) s /-- Topological sum of `term`s. -/ noncomputable def term_tsum (s : ℝ) : ℝ := ∑' n, term (n + 1) s lemma term_nonneg (n : ℕ) (s : ℝ) : 0 ≤ term n s := by rw [term, intervalIntegral.integral_of_le (by simp)] refine setIntegral_nonneg measurableSet_Ioc (fun x hx ↦ ?_) refine div_nonneg ?_ (rpow_nonneg ?_ _) all_goals linarith [hx.1] lemma term_welldef {n : ℕ} (hn : 0 < n) {s : ℝ} (hs : 0 < s) :	IntervalIntegrable (fun x : ℝ ↦ (x - n) / x ^ (s + 1)) volume n (n + 1) := by rw [intervalIntegrable_iff_integrableOn_Icc_of_le (by linarith)] refine (continuousOn_of_forall_continuousAt fun x hx ↦ ContinuousAt.div ?_ ?_ ?_).integrableOn_Icc · fun_prop · apply continuousAt_id.rpow_const (Or.inr <\| by linarith) · exact (rpow_pos_of_pos ((Nat.cast_pos.mpr hn).trans_le hx.1) _).ne'	Mathlib/NumberTheory/Harmonic/ZetaAsymp.lean	59	65
/- Copyright (c) 2021 David Wärn. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: David Wärn -/ import Mathlib.Data.Fintype.Option import Mathlib.Data.Fintype.Shrink import Mathlib.Data.Fintype.Sum import Mathlib.Data.Finite.Prod import Mathlib.Algebra.BigOperators.Group.Finset.Basic /-! # The Hales-Jewett theorem We prove the Hales-Jewett theorem. We deduce Van der Waerden's theorem and the multidimensional Hales-Jewett theorem as corollaries. The Hales-Jewett theorem is a result in Ramsey theory dealing with combinatorial lines. Given an 'alphabet' `α : Type` and `a b : α`, an example of a combinatorial line in `α^5` is `{ (a, x, x, b, x) \| x : α }`. See `Combinatorics.Line` for a precise general definition. The Hales-Jewett theorem states that for any fixed finite types `α` and `κ`, there exists a (potentially huge) finite type `ι` such that whenever `ι → α` is `κ`-colored (i.e. for any coloring `C : (ι → α) → κ`), there exists a monochromatic line. We prove the Hales-Jewett theorem using the idea of color focusing* and a product argument. See the proof of `Combinatorics.Line.exists_mono_in_high_dimension'` for details. Combinatorial subspaces are higher-dimensional analogues of combinatorial lines. See `Combinatorics.Subspace`. The multidimensional Hales-Jewett theorem generalises the statement above from combinatorial lines to combinatorial subspaces of a fixed dimension. The version of Van der Waerden's theorem in this file states that whenever a commutative monoid `M` is finitely colored and `S` is a finite subset, there exists a monochromatic homothetic copy of `S`. This follows from the Hales-Jewett theorem by considering the map `(ι → S) → M` sending `v` to `∑ i : ι, v i`, which sends a combinatorial line to a homothetic copy of `S`. ## Main results - `Combinatorics.Line.exists_mono_in_high_dimension`: The Hales-Jewett theorem. - `Combinatorics.Subspace.exists_mono_in_high_dimension`: The multidimensional Hales-Jewett theorem. - `Combinatorics.exists_mono_homothetic_copy`: A generalization of Van der Waerden's theorem. ## Implementation details For convenience, we work directly with finite types instead of natural numbers. That is, we write `α, ι, κ` for (finite) types where one might traditionally use natural numbers `n, H, c`. This allows us to work directly with `α`, `Option α`, `(ι → α) → κ`, and `ι ⊕ ι'` instead of `Fin n`, `Fin (n+1)`, `Fin (c^(n^H))`, and `Fin (H + H')`. ## TODO - Prove a finitary version of Van der Waerden's theorem (either by compactness or by modifying the current proof). - One could reformulate the proof of Hales-Jewett to give explicit upper bounds on the number of coordinates needed. ## Tags combinatorial line, Ramsey theory, arithmetic progression ### References * https://en.wikipedia.org/wiki/Hales%E2%80%93Jewett_theorem -/ open Function open scoped Finset universe u v variable {η α ι κ : Type} namespace Combinatorics /-- The type of combinatorial subspaces. A subspace `l : Subspace η α ι` in the hypercube `ι → α` defines a function `(η → α) → ι → α` from `η → α` to the hypercube, such that for each coordinate `i : ι` and direction `e : η`, the function `fun x ↦ l x i` is either `fun x ↦ x e` for some direction `e : η` or constant. We require subspaces to be non-degenerate in the sense that, for every `e : η`, `fun x ↦ l x i` is `fun x ↦ x e` for at least one `i`. Formally, a subspace is represented by a word `l.idxFun : ι → α ⊕ η` which says whether `fun x ↦ l x i` is `fun x ↦ x e` (corresponding to `l.idxFun i = Sum.inr e`) or constantly `a` (corresponding to `l.idxFun i = Sum.inl a`). When `α` has size `1` there can be many elements of `Subspace η α ι` defining the same function. -/ @[ext] structure Subspace (η α ι : Type) where /-- The word representing a combinatorial subspace. `l.idxfun i = Sum.inr e` means that `l x i = x e` for all `x` and `l.idxfun i = some a` means that `l x i = a` for all `x`. -/ idxFun : ι → α ⊕ η /-- We require combinatorial subspaces to be nontrivial in the sense that `fun x ↦ l x i` is `fun x ↦ x e` for at least one coordinate `i`. -/ proper : ∀ e, ∃ i, idxFun i = Sum.inr e namespace Subspace variable {η α ι κ : Type} {l : Subspace η α ι} {x : η → α} {i : ι} {a : α} {e : η} /-- The combinatorial subspace corresponding to the identity embedding `(ι → α) → (ι → α)`. -/ instance : Inhabited (Subspace ι α ι) := ⟨⟨Sum.inr, fun i ↦ ⟨i, rfl⟩⟩⟩ /-- Consider a subspace `l : Subspace η α ι` as a function `(η → α) → ι → α`. -/ @[coe] def toFun (l : Subspace η α ι) (x : η → α) (i : ι) : α := (l.idxFun i).elim id x instance instCoeFun : CoeFun (Subspace η α ι) (fun _ ↦ (η → α) → ι → α) := ⟨toFun⟩ lemma coe_apply (l : Subspace η α ι) (x : η → α) (i : ι) : l x i = (l.idxFun i).elim id x := rfl -- Note: This is not made a `FunLike` instance to avoid having two syntactically different coercions lemma coe_injective [Nontrivial α] : Injective ((⇑) : Subspace η α ι → (η → α) → ι → α) := by classical rintro l m hlm ext i simp only [funext_iff] at hlm cases hl : idxFun l i with \| inl a => obtain ⟨b, hba⟩ := exists_ne a cases hm : idxFun m i <;> simpa [hl, hm, hba.symm, coe_apply] using hlm (const _ b) i \| inr e => cases hm : idxFun m i with \| inl a => obtain ⟨b, hba⟩ := exists_ne a simpa [hl, hm, hba, coe_apply] using hlm (const _ b) i \| inr f => obtain ⟨a, b, hab⟩ := exists_pair_ne α simp only [Sum.inr.injEq] by_contra! hef simpa [hl, hm, hef, hab, coe_apply] using hlm (Function.update (const _ a) f b) i lemma apply_def (l : Subspace η α ι) (x : η → α) (i : ι) : l x i = (l.idxFun i).elim id x := rfl lemma apply_inl (h : l.idxFun i = Sum.inl a) : l x i = a := by simp [apply_def, h] lemma apply_inr (h : l.idxFun i = Sum.inr e) : l x i = x e := by simp [apply_def, h] /-- Given a coloring `C` of `ι → α` and a combinatorial subspace `l` of `ι → α`, `l.IsMono C` means that `l` is monochromatic with regard to `C`. -/ def IsMono (C : (ι → α) → κ) (l : Subspace η α ι) : Prop := ∃ c, ∀ x, C (l x) = c variable {η' α' ι' : Type} /-- Change the index types of a subspace. -/ def reindex (l : Subspace η α ι) (eη : η ≃ η') (eα : α ≃ α') (eι : ι ≃ ι') : Subspace η' α' ι' where idxFun i := (l.idxFun <\| eι.symm i).map eα eη proper e := (eι.exists_congr fun i ↦ by cases h : idxFun l i <;> simp [, funext_iff, Equiv.eq_symm_apply]).1 <\| l.proper <\| eη.symm e @[simp] lemma reindex_apply (l : Subspace η α ι) (eη : η ≃ η') (eα : α ≃ α') (eι : ι ≃ ι') (x i) : l.reindex eη eα eι x i = eα (l (eα.symm ∘ x ∘ eη) <\| eι.symm i) := by cases h : l.idxFun (eι.symm i) <;> simp [h, reindex, coe_apply] @[simp] lemma reindex_isMono {eη : η ≃ η'} {eα : α ≃ α'} {eι : ι ≃ ι'} {C : (ι' → α') → κ} : (l.reindex eη eα eι).IsMono C ↔ l.IsMono fun x ↦ C <\| eα ∘ x ∘ eι.symm := by simp only [IsMono, funext (reindex_apply _ _ _ _ _), coe_apply] exact exists_congr fun c ↦ (eη.arrowCongr eα).symm.forall_congr <\| by aesop protected lemma IsMono.reindex {eη : η ≃ η'} {eα : α ≃ α'} {eι : ι ≃ ι'} {C : (ι → α) → κ} (hl : l.IsMono C) : (l.reindex eη eα eι).IsMono fun x ↦ C <\| eα.symm ∘ x ∘ eι := by simp [reindex_isMono, Function.comp_assoc]; simpa [← Function.comp_assoc] end Subspace /-- The type of combinatorial lines. A line `l : Line α ι` in the hypercube `ι → α` defines a function `α → ι → α` from `α` to the hypercube, such that for each coordinate `i : ι`, the function `fun x ↦ l x i` is either `id` or constant. We require lines to be nontrivial in the sense that `fun x ↦ l x i` is `id` for at least one `i`. Formally, a line is represented by a word `l.idxFun : ι → Option α` which says whether `fun x ↦ l x i` is `id` (corresponding to `l.idxFun i = none`) or constantly `y` (corresponding to `l.idxFun i = some y`). When `α` has size `1` there can be many elements of `Line α ι` defining the same function. -/ @[ext] structure Line (α ι : Type) where /-- The word representing a combinatorial line. `l.idxfun i = none` means that `l x i = x` for all `x` and `l.idxfun i = some y` means that `l x i = y`. -/ idxFun : ι → Option α /-- We require combinatorial lines to be nontrivial in the sense that `fun x ↦ l x i` is `id` for at least one coordinate `i`. -/ proper : ∃ i, idxFun i = none namespace Line variable {l : Line α ι} {i : ι} {a x : α} /-- Consider a line `l : Line α ι` as a function `α → ι → α`. -/ @[coe] def toFun (l : Line α ι) (x : α) (i : ι) : α := (l.idxFun i).getD x -- This lets us treat a line `l : Line α ι` as a function `α → ι → α`. instance instCoeFun : CoeFun (Line α ι) fun _ => α → ι → α := ⟨toFun⟩ @[simp] lemma coe_apply (l : Line α ι) (x : α) (i : ι) : l x i = (l.idxFun i).getD x := rfl -- Note: This is not made a `FunLike` instance to avoid having two syntactically different coercions lemma coe_injective [Nontrivial α] : Injective ((⇑) : Line α ι → α → ι → α) := by rintro l m hlm ext i a obtain ⟨b, hba⟩ := exists_ne a simp only [Option.mem_def, funext_iff] at hlm ⊢ refine ⟨fun h ↦ ?_, fun h ↦ ?_⟩ · cases hi : idxFun m i <;> simpa [@eq_comm _ a, hi, h, hba] using hlm b i · cases hi : idxFun l i <;> simpa [@eq_comm _ a, hi, h, hba] using hlm b i /-- A line is monochromatic if all its points are the same color. -/ def IsMono {α ι κ} (C : (ι → α) → κ) (l : Line α ι) : Prop := ∃ c, ∀ x, C (l x) = c /-- Consider a line as a one-dimensional subspace. -/ def toSubspaceUnit (l : Line α ι) : Subspace Unit α ι where idxFun i := (l.idxFun i).elim (.inr ()) .inl proper _ := l.proper.imp fun i hi ↦ by simp [hi] @[simp] lemma toSubspaceUnit_apply (l : Line α ι) (a) : ⇑l.toSubspaceUnit a = l (a ()) := by ext i; cases h : l.idxFun i <;> simp [toSubspaceUnit, h, Subspace.coe_apply]	@[simp] lemma toSubspaceUnit_isMono {C : (ι → α) → κ} : l.toSubspaceUnit.IsMono C ↔ l.IsMono C := by	Mathlib/Combinatorics/HalesJewett.lean	211	212
/- Copyright (c) 2020 Johan Commelin. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johan Commelin, Robert Y. Lewis -/ import Mathlib.FieldTheory.Finite.Polynomial import Mathlib.NumberTheory.Basic import Mathlib.RingTheory.WittVector.WittPolynomial /-! # Witt structure polynomials In this file we prove the main theorem that makes the whole theory of Witt vectors work. Briefly, consider a polynomial `Φ : MvPolynomial idx ℤ` over the integers, with polynomials variables indexed by an arbitrary type `idx`. Then there exists a unique family of polynomials `φ : ℕ → MvPolynomial (idx × ℕ) Φ` such that for all `n : ℕ` we have (`wittStructureInt_existsUnique`) ``` bind₁ φ (wittPolynomial p ℤ n) = bind₁ (fun i ↦ (rename (prod.mk i) (wittPolynomial p ℤ n))) Φ ``` In other words: evaluating the `n`-th Witt polynomial on the family `φ` is the same as evaluating `Φ` on the (appropriately renamed) `n`-th Witt polynomials. N.b.: As far as we know, these polynomials do not have a name in the literature, so we have decided to call them the “Witt structure polynomials”. See `wittStructureInt`. ## Special cases With the main result of this file in place, we apply it to certain special polynomials. For example, by taking `Φ = X tt + X ff` resp. `Φ = X tt * X ff` we obtain families of polynomials `witt_add` resp. `witt_mul` (with type `ℕ → MvPolynomial (Bool × ℕ) ℤ`) that will be used in later files to define the addition and multiplication on the ring of Witt vectors. ## Outline of the proof The proof of `wittStructureInt_existsUnique` is rather technical, and takes up most of this file. We start by proving the analogous version for polynomials with rational coefficients, instead of integer coefficients. In this case, the solution is rather easy, since the Witt polynomials form a faithful change of coordinates in the polynomial ring `MvPolynomial ℕ ℚ`. We therefore obtain a family of polynomials `wittStructureRat Φ` for every `Φ : MvPolynomial idx ℚ`. If `Φ` has integer coefficients, then the polynomials `wittStructureRat Φ n` do so as well. Proving this claim is the essential core of this file, and culminates in `map_wittStructureInt`, which proves that upon mapping the coefficients of `wittStructureInt Φ n` from the integers to the rationals, one obtains `wittStructureRat Φ n`. Ultimately, the proof of `map_wittStructureInt` relies on ``` dvd_sub_pow_of_dvd_sub {R : Type} [CommRing R] {p : ℕ} {a b : R} : (p : R) ∣ a - b → ∀ (k : ℕ), (p : R) ^ (k + 1) ∣ a ^ p ^ k - b ^ p ^ k ``` ## Main results `wittStructureRat Φ`: the family of polynomials `ℕ → MvPolynomial (idx × ℕ) ℚ` associated with `Φ : MvPolynomial idx ℚ` and satisfying the property explained above. * `wittStructureRat_prop`: the proof that `wittStructureRat` indeed satisfies the property. * `wittStructureInt Φ`: the family of polynomials `ℕ → MvPolynomial (idx × ℕ) ℤ` associated with `Φ : MvPolynomial idx ℤ` and satisfying the property explained above. * `map_wittStructureInt`: the proof that the integral polynomials `with_structure_int Φ` are equal to `wittStructureRat Φ` when mapped to polynomials with rational coefficients. * `wittStructureInt_prop`: the proof that `wittStructureInt` indeed satisfies the property. * Five families of polynomials that will be used to define the ring structure on the ring of Witt vectors: - `WittVector.wittZero` - `WittVector.wittOne` - `WittVector.wittAdd` - `WittVector.wittMul` - `WittVector.wittNeg` (We also define `WittVector.wittSub`, and later we will prove that it describes subtraction, which is defined as `fun a b ↦ a + -b`. See `WittVector.sub_coeff` for this proof.) ## References * [Hazewinkel, Witt Vectors][Haze09] * [Commelin and Lewis, Formalizing the Ring of Witt Vectors][CL21] -/ open MvPolynomial Set open Finset (range) open Finsupp (single) -- This lemma reduces a bundled morphism to a "mere" function, -- and consequently the simplifier cannot use a lot of powerful simp-lemmas. -- We disable this locally, and probably it should be disabled globally in mathlib. attribute [-simp] coe_eval₂Hom variable {p : ℕ} {R : Type} {idx : Type} [CommRing R] open scoped Witt section PPrime variable (p) variable [hp : Fact p.Prime] -- Notation with ring of coefficients explicit set_option quotPrecheck false in @[inherit_doc] scoped[Witt] notation "W_" => wittPolynomial p -- Notation with ring of coefficients implicit set_option quotPrecheck false in @[inherit_doc] scoped[Witt] notation "W" => wittPolynomial p _ /-- `wittStructureRat Φ` is a family of polynomials `ℕ → MvPolynomial (idx × ℕ) ℚ` that are uniquely characterised by the property that ``` bind₁ (wittStructureRat p Φ) (wittPolynomial p ℚ n) = bind₁ (fun i ↦ (rename (prod.mk i) (wittPolynomial p ℚ n))) Φ ``` In other words: evaluating the `n`-th Witt polynomial on the family `wittStructureRat Φ` is the same as evaluating `Φ` on the (appropriately renamed) `n`-th Witt polynomials. See `wittStructureRat_prop` for this property, and `wittStructureRat_existsUnique` for the fact that `wittStructureRat` gives the unique family of polynomials with this property. These polynomials turn out to have integral coefficients, but it requires some effort to show this. See `wittStructureInt` for the version with integral coefficients, and `map_wittStructureInt` for the fact that it is equal to `wittStructureRat` when mapped to polynomials over the rationals. -/ noncomputable def wittStructureRat (Φ : MvPolynomial idx ℚ) (n : ℕ) : MvPolynomial (idx × ℕ) ℚ := bind₁ (fun k => bind₁ (fun i => rename (Prod.mk i) (W_ ℚ k)) Φ) (xInTermsOfW p ℚ n) theorem wittStructureRat_prop (Φ : MvPolynomial idx ℚ) (n : ℕ) : bind₁ (wittStructureRat p Φ) (W_ ℚ n) = bind₁ (fun i => rename (Prod.mk i) (W_ ℚ n)) Φ := calc bind₁ (wittStructureRat p Φ) (W_ ℚ n) = bind₁ (fun k => bind₁ (fun i => (rename (Prod.mk i)) (W_ ℚ k)) Φ) (bind₁ (xInTermsOfW p ℚ) (W_ ℚ n)) := by rw [bind₁_bind₁]; exact eval₂Hom_congr (RingHom.ext_rat _ _) rfl rfl _ = bind₁ (fun i => rename (Prod.mk i) (W_ ℚ n)) Φ := by rw [bind₁_xInTermsOfW_wittPolynomial p _ n, bind₁_X_right] theorem wittStructureRat_existsUnique (Φ : MvPolynomial idx ℚ) : ∃! φ : ℕ → MvPolynomial (idx × ℕ) ℚ, ∀ n : ℕ, bind₁ φ (W_ ℚ n) = bind₁ (fun i => rename (Prod.mk i) (W_ ℚ n)) Φ := by refine ⟨wittStructureRat p Φ, ?_, ?_⟩ · intro n; apply wittStructureRat_prop · intro φ H funext n rw [show φ n = bind₁ φ (bind₁ (W_ ℚ) (xInTermsOfW p ℚ n)) by rw [bind₁_wittPolynomial_xInTermsOfW p, bind₁_X_right]] rw [bind₁_bind₁] exact eval₂Hom_congr (RingHom.ext_rat _ _) (funext H) rfl theorem wittStructureRat_rec_aux (Φ : MvPolynomial idx ℚ) (n : ℕ) : wittStructureRat p Φ n * C ((p : ℚ) ^ n) = bind₁ (fun b => rename (fun i => (b, i)) (W_ ℚ n)) Φ - ∑ i ∈ range n, C ((p : ℚ) ^ i) * wittStructureRat p Φ i ^ p ^ (n - i) := by have := xInTermsOfW_aux p ℚ n replace := congr_arg (bind₁ fun k : ℕ => bind₁ (fun i => rename (Prod.mk i) (W_ ℚ k)) Φ) this rw [map_mul, bind₁_C_right] at this rw [wittStructureRat, this]; clear this conv_lhs => simp only [map_sub, bind₁_X_right] rw [sub_right_inj] simp only [map_sum, map_mul, bind₁_C_right, map_pow] rfl /-- Write `wittStructureRat p φ n` in terms of `wittStructureRat p φ i` for `i < n`. -/ theorem wittStructureRat_rec (Φ : MvPolynomial idx ℚ) (n : ℕ) : wittStructureRat p Φ n = C (1 / (p : ℚ) ^ n) * (bind₁ (fun b => rename (fun i => (b, i)) (W_ ℚ n)) Φ - ∑ i ∈ range n, C ((p : ℚ) ^ i) * wittStructureRat p Φ i ^ p ^ (n - i)) := by calc wittStructureRat p Φ n = C (1 / (p : ℚ) ^ n) * (wittStructureRat p Φ n * C ((p : ℚ) ^ n)) := ?_ _ = _ := by rw [wittStructureRat_rec_aux] rw [mul_left_comm, ← C_mul, div_mul_cancel₀, C_1, mul_one] exact pow_ne_zero _ (Nat.cast_ne_zero.2 hp.1.ne_zero) /-- `wittStructureInt Φ` is a family of polynomials `ℕ → MvPolynomial (idx × ℕ) ℤ` that are uniquely characterised by the property that ``` bind₁ (wittStructureInt p Φ) (wittPolynomial p ℤ n) = bind₁ (fun i ↦ (rename (prod.mk i) (wittPolynomial p ℤ n))) Φ ``` In other words: evaluating the `n`-th Witt polynomial on the family `wittStructureInt Φ` is the same as evaluating `Φ` on the (appropriately renamed) `n`-th Witt polynomials. See `wittStructureInt_prop` for this property, and `wittStructureInt_existsUnique` for the fact that `wittStructureInt` gives the unique family of polynomials with this property. -/ noncomputable def wittStructureInt (Φ : MvPolynomial idx ℤ) (n : ℕ) : MvPolynomial (idx × ℕ) ℤ := Finsupp.mapRange Rat.num (Rat.num_intCast 0) (wittStructureRat p (map (Int.castRingHom ℚ) Φ) n) variable {p} theorem bind₁_rename_expand_wittPolynomial (Φ : MvPolynomial idx ℤ) (n : ℕ) (IH : ∀ m : ℕ, m < n + 1 → map (Int.castRingHom ℚ) (wittStructureInt p Φ m) = wittStructureRat p (map (Int.castRingHom ℚ) Φ) m) : bind₁ (fun b => rename (fun i => (b, i)) (expand p (W_ ℤ n))) Φ = bind₁ (fun i => expand p (wittStructureInt p Φ i)) (W_ ℤ n) := by apply MvPolynomial.map_injective (Int.castRingHom ℚ) Int.cast_injective simp only [map_bind₁, map_rename, map_expand, rename_expand, map_wittPolynomial] have key := (wittStructureRat_prop p (map (Int.castRingHom ℚ) Φ) n).symm apply_fun expand p at key simp only [expand_bind₁] at key rw [key]; clear key apply eval₂Hom_congr' rfl _ rfl rintro i hi - rw [wittPolynomial_vars, Finset.mem_range] at hi simp only [IH i hi] theorem C_p_pow_dvd_bind₁_rename_wittPolynomial_sub_sum (Φ : MvPolynomial idx ℤ) (n : ℕ) (IH : ∀ m : ℕ, m < n → map (Int.castRingHom ℚ) (wittStructureInt p Φ m) = wittStructureRat p (map (Int.castRingHom ℚ) Φ) m) : (C ((p ^ n :) : ℤ) : MvPolynomial (idx × ℕ) ℤ) ∣ bind₁ (fun b : idx => rename (fun i => (b, i)) (wittPolynomial p ℤ n)) Φ - ∑ i ∈ range n, C ((p : ℤ) ^ i) * wittStructureInt p Φ i ^ p ^ (n - i) := by rcases n with - \| n · simp only [isUnit_one, Int.ofNat_zero, Int.natCast_succ, zero_add, pow_zero, C_1, IsUnit.dvd, Nat.cast_one] -- prepare a useful equation for rewriting have key := bind₁_rename_expand_wittPolynomial Φ n IH apply_fun map (Int.castRingHom (ZMod (p ^ (n + 1)))) at key conv_lhs at key => simp only [map_bind₁, map_rename, map_expand, map_wittPolynomial] -- clean up and massage rw [C_dvd_iff_zmod, RingHom.map_sub, sub_eq_zero, map_bind₁] simp only [map_rename, map_wittPolynomial, wittPolynomial_zmod_self] rw [key]; clear key IH rw [bind₁, aeval_wittPolynomial, map_sum, map_sum, Finset.sum_congr rfl] intro k hk rw [Finset.mem_range, Nat.lt_succ_iff] at hk -- Porting note (https://github.com/leanprover-community/mathlib4/issues/11083): was much slower -- simp only [← sub_eq_zero, ← RingHom.map_sub, ← C_dvd_iff_zmod, C_eq_coe_nat, ← mul_sub, ← -- Nat.cast_pow] rw [← sub_eq_zero, ← RingHom.map_sub, ← C_dvd_iff_zmod, C_eq_coe_nat, ← Nat.cast_pow, ← Nat.cast_pow, C_eq_coe_nat, ← mul_sub] have : p ^ (n + 1) = p ^ k * p ^ (n - k + 1) := by rw [← pow_add, ← add_assoc]; congr 2; rw [add_comm, ← tsub_eq_iff_eq_add_of_le hk] rw [this] rw [Nat.cast_mul, Nat.cast_pow, Nat.cast_pow] apply mul_dvd_mul_left ((p : MvPolynomial (idx × ℕ) ℤ) ^ k) rw [show p ^ (n + 1 - k) = p * p ^ (n - k) by rw [← pow_succ', ← tsub_add_eq_add_tsub hk]] rw [pow_mul] -- the machine! apply dvd_sub_pow_of_dvd_sub rw [← C_eq_coe_nat, C_dvd_iff_zmod, RingHom.map_sub, sub_eq_zero, map_expand, RingHom.map_pow, MvPolynomial.expand_zmod] variable (p) @[simp] theorem map_wittStructureInt (Φ : MvPolynomial idx ℤ) (n : ℕ) : map (Int.castRingHom ℚ) (wittStructureInt p Φ n) = wittStructureRat p (map (Int.castRingHom ℚ) Φ) n := by induction n using Nat.strong_induction_on with \| h n IH => ?_ rw [wittStructureInt, map_mapRange_eq_iff, Int.coe_castRingHom] intro c rw [wittStructureRat_rec, coeff_C_mul, mul_comm, mul_div_assoc', mul_one] have sum_induction_steps : map (Int.castRingHom ℚ) (∑ i ∈ range n, C ((p : ℤ) ^ i) * wittStructureInt p Φ i ^ p ^ (n - i)) = ∑ i ∈ range n, C ((p : ℚ) ^ i) * wittStructureRat p (map (Int.castRingHom ℚ) Φ) i ^ p ^ (n - i) := by rw [map_sum] apply Finset.sum_congr rfl intro i hi rw [Finset.mem_range] at hi simp only [IH i hi, RingHom.map_mul, RingHom.map_pow, map_C] rfl simp only [← sum_induction_steps, ← map_wittPolynomial p (Int.castRingHom ℚ), ← map_rename, ← map_bind₁, ← RingHom.map_sub, coeff_map] rw [show (p : ℚ) ^ n = ((↑(p ^ n) : ℤ) : ℚ) by norm_cast] rw [← Rat.den_eq_one_iff, eq_intCast, Rat.den_div_intCast_eq_one_iff] swap; · exact mod_cast pow_ne_zero n hp.1.ne_zero revert c; rw [← C_dvd_iff_dvd_coeff] exact C_p_pow_dvd_bind₁_rename_wittPolynomial_sub_sum Φ n IH theorem wittStructureInt_prop (Φ : MvPolynomial idx ℤ) (n) : bind₁ (wittStructureInt p Φ) (wittPolynomial p ℤ n) = bind₁ (fun i => rename (Prod.mk i) (W_ ℤ n)) Φ := by apply MvPolynomial.map_injective (Int.castRingHom ℚ) Int.cast_injective have := wittStructureRat_prop p (map (Int.castRingHom ℚ) Φ) n simpa only [map_bind₁, ← eval₂Hom_map_hom, eval₂Hom_C_left, map_rename, map_wittPolynomial, AlgHom.coe_toRingHom, map_wittStructureInt] theorem eq_wittStructureInt (Φ : MvPolynomial idx ℤ) (φ : ℕ → MvPolynomial (idx × ℕ) ℤ) (h : ∀ n, bind₁ φ (wittPolynomial p ℤ n) = bind₁ (fun i => rename (Prod.mk i) (W_ ℤ n)) Φ) : φ = wittStructureInt p Φ := by funext k apply MvPolynomial.map_injective (Int.castRingHom ℚ) Int.cast_injective rw [map_wittStructureInt] -- Porting note: was `refine' congr_fun _ k` revert k refine congr_fun ?_ apply ExistsUnique.unique (wittStructureRat_existsUnique p (map (Int.castRingHom ℚ) Φ)) · intro n specialize h n apply_fun map (Int.castRingHom ℚ) at h simpa only [map_bind₁, ← eval₂Hom_map_hom, eval₂Hom_C_left, map_rename, map_wittPolynomial, AlgHom.coe_toRingHom] using h · intro n; apply wittStructureRat_prop theorem wittStructureInt_existsUnique (Φ : MvPolynomial idx ℤ) : ∃! φ : ℕ → MvPolynomial (idx × ℕ) ℤ, ∀ n : ℕ, bind₁ φ (wittPolynomial p ℤ n) = bind₁ (fun i : idx => rename (Prod.mk i) (W_ ℤ n)) Φ := ⟨wittStructureInt p Φ, wittStructureInt_prop _ _, eq_wittStructureInt _ _⟩ theorem witt_structure_prop (Φ : MvPolynomial idx ℤ) (n) : aeval (fun i => map (Int.castRingHom R) (wittStructureInt p Φ i)) (wittPolynomial p ℤ n) = aeval (fun i => rename (Prod.mk i) (W n)) Φ := by convert congr_arg (map (Int.castRingHom R)) (wittStructureInt_prop p Φ n) using 1 <;> rw [hom_bind₁] <;> apply eval₂Hom_congr (RingHom.ext_int _ _) _ rfl · rfl · simp only [map_rename, map_wittPolynomial] theorem wittStructureInt_rename {σ : Type*} (Φ : MvPolynomial idx ℤ) (f : idx → σ) (n : ℕ) : wittStructureInt p (rename f Φ) n = rename (Prod.map f id) (wittStructureInt p Φ n) := by apply MvPolynomial.map_injective (Int.castRingHom ℚ) Int.cast_injective simp only [map_rename, map_wittStructureInt, wittStructureRat, rename_bind₁, rename_rename, bind₁_rename] rfl	@[simp] theorem constantCoeff_wittStructureRat_zero (Φ : MvPolynomial idx ℚ) : constantCoeff (wittStructureRat p Φ 0) = constantCoeff Φ := by simp only [wittStructureRat, bind₁, map_aeval, xInTermsOfW_zero, constantCoeff_rename, constantCoeff_wittPolynomial, aeval_X, constantCoeff_comp_algebraMap, eval₂Hom_zero'_apply, RingHom.id_apply]	Mathlib/RingTheory/WittVector/StructurePolynomial.lean	336	343
/- Copyright (c) 2020 Kenny Lau. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kenny Lau, Johan Commelin, Patrick Massot -/ import Mathlib.Algebra.GroupWithZero.InjSurj import Mathlib.Algebra.GroupWithZero.Units.Equiv import Mathlib.Algebra.GroupWithZero.WithZero import Mathlib.Algebra.Order.AddGroupWithTop import Mathlib.Algebra.Order.GroupWithZero.Unbundled.OrderIso import Mathlib.Algebra.Order.Monoid.Basic import Mathlib.Algebra.Order.Monoid.OrderDual import Mathlib.Algebra.Order.Monoid.TypeTags /-! # Linearly ordered commutative groups and monoids with a zero element adjoined This file sets up a special class of linearly ordered commutative monoids that show up as the target of so-called “valuations” in algebraic number theory. Usually, in the informal literature, these objects are constructed by taking a linearly ordered commutative group Γ and formally adjoining a zero element: Γ ∪ {0}. The disadvantage is that a type such as `NNReal` is not of that form, whereas it is a very common target for valuations. The solutions is to use a typeclass, and that is exactly what we do in this file. -/ variable {α : Type} /-- A linearly ordered commutative monoid with a zero element. -/ class LinearOrderedCommMonoidWithZero (α : Type) extends CommMonoidWithZero α, LinearOrder α, IsOrderedMonoid α, OrderBot α where /-- `0 ≤ 1` in any linearly ordered commutative monoid. -/ zero_le_one : (0 : α) ≤ 1 /-- A linearly ordered commutative group with a zero element. -/ class LinearOrderedCommGroupWithZero (α : Type) extends LinearOrderedCommMonoidWithZero α, CommGroupWithZero α instance (priority := 100) LinearOrderedCommMonoidWithZero.toZeroLeOneClass [LinearOrderedCommMonoidWithZero α] : ZeroLEOneClass α := { ‹LinearOrderedCommMonoidWithZero α› with } instance (priority := 100) CanonicallyOrderedAdd.toZeroLeOneClass [AddZeroClass α] [LE α] [CanonicallyOrderedAdd α] [One α] : ZeroLEOneClass α := ⟨zero_le 1⟩ section LinearOrderedCommMonoidWithZero variable [LinearOrderedCommMonoidWithZero α] {a b : α} {n : ℕ} /- The following facts are true more generally in a (linearly) ordered commutative monoid. -/ /-- Pullback a `LinearOrderedCommMonoidWithZero` under an injective map. See note [reducible non-instances]. -/ abbrev Function.Injective.linearOrderedCommMonoidWithZero {β : Type} [Zero β] [Bot β] [One β] [Mul β] [Pow β ℕ] [Max β] [Min β] (f : β → α) (hf : Function.Injective f) (zero : f 0 = 0) (one : f 1 = 1) (mul : ∀ x y, f (x * y) = f x * f y) (npow : ∀ (x) (n : ℕ), f (x ^ n) = f x ^ n) (hsup : ∀ x y, f (x ⊔ y) = max (f x) (f y)) (hinf : ∀ x y, f (x ⊓ y) = min (f x) (f y)) (bot : f ⊥ = ⊥) : LinearOrderedCommMonoidWithZero β where __ := LinearOrder.lift f hf hsup hinf __ := hf.isOrderedMonoid f one mul npow __ := hf.commMonoidWithZero f zero one mul npow zero_le_one := show f 0 ≤ f 1 by simp only [zero, one, LinearOrderedCommMonoidWithZero.zero_le_one] bot_le a := show f ⊥ ≤ f a from bot ▸ bot_le @[simp] lemma zero_le' : 0 ≤ a := by simpa only [mul_zero, mul_one] using mul_le_mul_left' (zero_le_one' α) a @[simp] theorem not_lt_zero' : ¬a < 0 := not_lt_of_le zero_le' @[simp] theorem le_zero_iff : a ≤ 0 ↔ a = 0 := ⟨fun h ↦ le_antisymm h zero_le', fun h ↦ h ▸ le_rfl⟩ theorem zero_lt_iff : 0 < a ↔ a ≠ 0 := ⟨ne_of_gt, fun h ↦ lt_of_le_of_ne zero_le' h.symm⟩ theorem ne_zero_of_lt (h : b < a) : a ≠ 0 := fun h1 ↦ not_lt_zero' <\| show b < 0 from h1 ▸ h /-- See also `bot_eq_zero` and `bot_eq_zero'` for canonically ordered monoids. -/ lemma bot_eq_zero'' : (⊥ : α) = 0 := eq_of_forall_ge_iff fun _ ↦ by simp instance instLinearOrderedAddCommMonoidWithTopAdditiveOrderDual : LinearOrderedAddCommMonoidWithTop (Additive αᵒᵈ) where top := .ofMul <\| .toDual 0 top_add' a := zero_mul a.toMul.ofDual le_top _ := zero_le' instance instLinearOrderedAddCommMonoidWithTopOrderDualAdditive : LinearOrderedAddCommMonoidWithTop (Additive α)ᵒᵈ where top := .toDual <\| .ofMul _ top_add' := fun a ↦ zero_mul (Additive.toMul (OrderDual.ofDual a)) le_top := fun a ↦ @zero_le' _ _ (Additive.toMul (OrderDual.ofDual a)) variable [NoZeroDivisors α] lemma pow_pos_iff (hn : n ≠ 0) : 0 < a ^ n ↔ 0 < a := by simp_rw [zero_lt_iff, pow_ne_zero_iff hn] end LinearOrderedCommMonoidWithZero section LinearOrderedCommGroupWithZero variable [LinearOrderedCommGroupWithZero α] {a b c d : α} {m n : ℕ} -- See note [lower instance priority] instance (priority := 100) LinearOrderedCommGroupWithZero.toMulPosMono : MulPosMono α where elim _a _b _c hbc := mul_le_mul_right' hbc _ -- See note [lower instance priority] instance (priority := 100) LinearOrderedCommGroupWithZero.toPosMulMono : PosMulMono α where elim _a _b _c hbc := mul_le_mul_left' hbc _ -- See note [lower instance priority] instance (priority := 100) LinearOrderedCommGroupWithZero.toPosMulReflectLE : PosMulReflectLE α where elim a b c hbc := by simpa [a.2.ne'] using mul_le_mul_left' hbc a⁻¹ -- See note [lower instance priority] instance (priority := 100) LinearOrderedCommGroupWithZero.toMulPosReflectLE : MulPosReflectLE α where elim a b c hbc := by simpa [a.2.ne'] using mul_le_mul_right' hbc a⁻¹ -- See note [lower instance priority] instance (priority := 100) LinearOrderedCommGroupWithZero.toPosMulReflectLT : PosMulReflectLT α where elim _a _b _c := lt_of_mul_lt_mul_left' #adaptation_note /-- 2025-03-29 lean4#7717 Needed to add `dsimp only` -/ -- See note [lower instance priority] instance (priority := 100) LinearOrderedCommGroupWithZero.toPosMulStrictMono : PosMulStrictMono α where elim a b c hbc := by dsimp only; by_contra! h; exact hbc.not_le <\| (mul_le_mul_left a.2).1 h #adaptation_note /-- 2025-03-29 lean4#7717 Needed to add `dsimp only` -/ -- See note [lower instance priority] instance (priority := 100) LinearOrderedCommGroupWithZero.toMulPosStrictMono : MulPosStrictMono α where elim a b c hbc := by dsimp only; by_contra! h; exact hbc.not_le <\| (mul_le_mul_right a.2).1 h @[deprecated mul_inv_le_of_le_mul₀ (since := "2024-11-18")] theorem mul_inv_le_of_le_mul (hab : a ≤ b * c) : a * c⁻¹ ≤ b := mul_inv_le_of_le_mul₀ zero_le' zero_le' hab @[simp] theorem Units.zero_lt (u : αˣ) : (0 : α) < u := zero_lt_iff.2 u.ne_zero @[deprecated mul_lt_mul_of_le_of_lt_of_nonneg_of_pos (since := "2024-11-18")] theorem mul_lt_mul_of_lt_of_le₀ (hab : a ≤ b) (hb : b ≠ 0) (hcd : c < d) : a * c < b * d := mul_lt_mul_of_le_of_lt_of_nonneg_of_pos hab hcd zero_le' (zero_lt_iff.2 hb) @[deprecated mul_lt_mul'' (since := "2024-11-18")] theorem mul_lt_mul₀ (hab : a < b) (hcd : c < d) : a * c < b * d := mul_lt_mul'' hab hcd zero_le' zero_le' theorem mul_inv_lt_of_lt_mul₀ (h : a < b * c) : a * c⁻¹ < b := by contrapose! h simpa only [inv_inv] using mul_inv_le_of_le_mul₀ zero_le' zero_le' h theorem inv_mul_lt_of_lt_mul₀ (h : a < b * c) : b⁻¹ * a < c := by rw [mul_comm] at * exact mul_inv_lt_of_lt_mul₀ h theorem lt_of_mul_lt_mul_of_le₀ (h : a * b < c * d) (hc : 0 < c) (hh : c ≤ a) : b < d := by have ha : a ≠ 0 := ne_of_gt (lt_of_lt_of_le hc hh) rw [← inv_le_inv₀ (zero_lt_iff.2 ha) hc] at hh simpa [inv_mul_cancel_left₀ ha, inv_mul_cancel_left₀ hc.ne'] using mul_lt_mul_of_le_of_lt_of_nonneg_of_pos hh h zero_le' (inv_pos.2 hc) @[deprecated div_le_div_iff_of_pos_right (since := "2024-11-18")] theorem div_le_div_right₀ (hc : c ≠ 0) : a / c ≤ b / c ↔ a ≤ b := div_le_div_iff_of_pos_right (zero_lt_iff.2 hc) @[deprecated div_le_div_iff_of_pos_left (since := "2024-11-18")] theorem div_le_div_left₀ (ha : a ≠ 0) (hb : b ≠ 0) (hc : c ≠ 0) : a / b ≤ a / c ↔ c ≤ b := div_le_div_iff_of_pos_left (zero_lt_iff.2 ha) (zero_lt_iff.2 hb) (zero_lt_iff.2 hc) /-- `Equiv.mulLeft₀` as an `OrderIso` on a `LinearOrderedCommGroupWithZero.`. -/ @[simps! +simpRhs apply toEquiv, deprecated OrderIso.mulLeft₀ (since := "2024-11-18")] def OrderIso.mulLeft₀' {a : α} (ha : a ≠ 0) : α ≃o α := .mulLeft₀ a (zero_lt_iff.2 ha) set_option linter.deprecated false in @[deprecated OrderIso.mulLeft₀_symm (since := "2024-11-18")] theorem OrderIso.mulLeft₀'_symm {a : α} (ha : a ≠ 0) : (OrderIso.mulLeft₀' ha).symm = OrderIso.mulLeft₀' (inv_ne_zero ha) := by ext rfl /-- `Equiv.mulRight₀` as an `OrderIso` on a `LinearOrderedCommGroupWithZero.`. -/ @[simps! +simpRhs apply toEquiv, deprecated OrderIso.mulRight₀ (since := "2024-11-18")] def OrderIso.mulRight₀' {a : α} (ha : a ≠ 0) : α ≃o α := .mulRight₀ a (zero_lt_iff.2 ha) set_option linter.deprecated false in @[deprecated OrderIso.mulRight₀_symm (since := "2024-11-18")] theorem OrderIso.mulRight₀'_symm {a : α} (ha : a ≠ 0) : (OrderIso.mulRight₀' ha).symm = OrderIso.mulRight₀' (inv_ne_zero ha) := by ext rfl instance : LinearOrderedAddCommGroupWithTop (Additive αᵒᵈ) where neg_top := inv_zero (G₀ := α) add_neg_cancel := fun a ha ↦ mul_inv_cancel₀ (G₀ := α) (id ha : a.toMul ≠ 0) instance : LinearOrderedAddCommGroupWithTop (Additive α)ᵒᵈ where neg_top := inv_zero (G₀ := α) add_neg_cancel := fun a ha ↦ mul_inv_cancel₀ (G₀ := α) (id ha : a.toMul ≠ 0) @[deprecated pow_lt_pow_right₀ (since := "2024-11-18")] lemma pow_lt_pow_succ (ha : 1 < a) : a ^ n < a ^ n.succ := pow_lt_pow_right₀ ha n.lt_succ_self end LinearOrderedCommGroupWithZero instance instLinearOrderedCommMonoidWithZeroMultiplicativeOrderDual [LinearOrderedAddCommMonoidWithTop α] : LinearOrderedCommMonoidWithZero (Multiplicative αᵒᵈ) where zero := Multiplicative.ofAdd (OrderDual.toDual ⊤) zero_mul := @top_add _ (_) -- Porting note: Here and elsewhere in the file, just `zero_mul` worked in Lean 3. See -- https://leanprover.zulipchat.com/#narrow/stream/287929-mathlib4/topic/Type.20synonyms mul_zero := @add_top _ (_) zero_le_one := (le_top : (0 : α) ≤ ⊤) @[simp] theorem ofAdd_toDual_eq_zero_iff [LinearOrderedAddCommMonoidWithTop α] (x : α) : Multiplicative.ofAdd (OrderDual.toDual x) = 0 ↔ x = ⊤ := Iff.rfl @[simp] theorem ofDual_toAdd_eq_top_iff [LinearOrderedAddCommMonoidWithTop α] (x : Multiplicative αᵒᵈ) : OrderDual.ofDual x.toAdd = ⊤ ↔ x = 0 := Iff.rfl @[simp] theorem ofAdd_bot [LinearOrderedAddCommMonoidWithTop α] : Multiplicative.ofAdd ⊥ = (0 : Multiplicative αᵒᵈ) := rfl @[simp] theorem ofDual_toAdd_zero [LinearOrderedAddCommMonoidWithTop α] : OrderDual.ofDual (0 : Multiplicative αᵒᵈ).toAdd = ⊤ := rfl instance [LinearOrderedAddCommGroupWithTop α] : LinearOrderedCommGroupWithZero (Multiplicative αᵒᵈ) := { Multiplicative.divInvMonoid, instLinearOrderedCommMonoidWithZeroMultiplicativeOrderDual, Multiplicative.instNontrivial with inv_zero := @LinearOrderedAddCommGroupWithTop.neg_top _ (_) mul_inv_cancel := @LinearOrderedAddCommGroupWithTop.add_neg_cancel _ (_) } namespace WithZero section Preorder variable [Preorder α] {a b : α} instance instPreorder : Preorder (WithZero α) := WithBot.preorder instance instOrderBot : OrderBot (WithZero α) := WithBot.orderBot lemma zero_le (a : WithZero α) : 0 ≤ a := bot_le lemma zero_lt_coe (a : α) : (0 : WithZero α) < a := WithBot.bot_lt_coe a lemma zero_eq_bot : (0 : WithZero α) = ⊥ := rfl @[simp, norm_cast] lemma coe_lt_coe : (a : WithZero α) < b ↔ a < b := WithBot.coe_lt_coe @[simp, norm_cast] lemma coe_le_coe : (a : WithZero α) ≤ b ↔ a ≤ b := WithBot.coe_le_coe @[simp, norm_cast] lemma one_lt_coe [One α] : 1 < (a : WithZero α) ↔ 1 < a := coe_lt_coe @[simp, norm_cast] lemma one_le_coe [One α] : 1 ≤ (a : WithZero α) ↔ 1 ≤ a := coe_le_coe @[simp, norm_cast] lemma coe_lt_one [One α] : (a : WithZero α) < 1 ↔ a < 1 := coe_lt_coe @[simp, norm_cast] lemma coe_le_one [One α] : (a : WithZero α) ≤ 1 ↔ a ≤ 1 := coe_le_coe theorem coe_le_iff {x : WithZero α} : (a : WithZero α) ≤ x ↔ ∃ b : α, x = b ∧ a ≤ b := WithBot.coe_le_iff @[simp] lemma unzero_le_unzero {a b : WithZero α} (ha hb) : unzero (x := a) ha ≤ unzero (x := b) hb ↔ a ≤ b := by -- TODO: Fix `lift` so that it doesn't try to clear the hypotheses I give it when it is -- impossible to do so. See https://github.com/leanprover-community/mathlib4/issues/19160 lift a to α using id ha lift b to α using id hb simp instance instMulLeftMono [Mul α] [MulLeftMono α] : MulLeftMono (WithZero α) := by refine ⟨fun a b c hbc => ?_⟩ induction a; · exact zero_le _ induction b; · exact zero_le _ rcases WithZero.coe_le_iff.1 hbc with ⟨c, rfl, hbc'⟩ rw [← coe_mul _ c, ← coe_mul, coe_le_coe] exact mul_le_mul_left' hbc' _ protected lemma addLeftMono [AddZeroClass α] [AddLeftMono α] (h : ∀ a : α, 0 ≤ a) : AddLeftMono (WithZero α) := by refine ⟨fun a b c hbc => ?_⟩ induction a · rwa [zero_add, zero_add] induction b · rw [add_zero] induction c · rw [add_zero] · rw [← coe_add, coe_le_coe] exact le_add_of_nonneg_right (h _) · rcases WithZero.coe_le_iff.1 hbc with ⟨c, rfl, hbc'⟩ rw [← coe_add, ← coe_add _ c, coe_le_coe] exact add_le_add_left hbc' _ instance instExistsAddOfLE [Add α] [ExistsAddOfLE α] : ExistsAddOfLE (WithZero α) := ⟨fun {a b} => by induction a · exact fun _ => ⟨b, (zero_add b).symm⟩ induction b · exact fun h => (WithBot.not_coe_le_bot _ h).elim intro h obtain ⟨c, rfl⟩ := exists_add_of_le (WithZero.coe_le_coe.1 h) exact ⟨c, rfl⟩⟩ end Preorder section PartialOrder variable [PartialOrder α] instance instPartialOrder : PartialOrder (WithZero α) := WithBot.partialOrder instance instMulLeftReflectLT [Mul α] [MulLeftReflectLT α] : MulLeftReflectLT (WithZero α) := by refine ⟨fun a b c h => ?_⟩ have := ((zero_le _).trans_lt h).ne' induction a · simp at this induction c · simp at this induction b exacts [zero_lt_coe _, coe_lt_coe.mpr (lt_of_mul_lt_mul_left' <\| coe_lt_coe.mp h)] end PartialOrder instance instLattice [Lattice α] : Lattice (WithZero α) := WithBot.lattice section LinearOrder variable [LinearOrder α] {a b c : α} instance instLinearOrder : LinearOrder (WithZero α) := WithBot.linearOrder protected lemma le_max_iff : (a : WithZero α) ≤ max (b : WithZero α) c ↔ a ≤ max b c := by simp only [WithZero.coe_le_coe, le_max_iff] protected lemma min_le_iff : min (a : WithZero α) b ≤ c ↔ min a b ≤ c := by simp only [WithZero.coe_le_coe, min_le_iff] end LinearOrder instance isOrderedMonoid [CommMonoid α] [PartialOrder α] [IsOrderedMonoid α] : IsOrderedMonoid (WithZero α) where mul_le_mul_left := fun _ _ => mul_le_mul_left' /- Note 1 : the below is not an instance because it requires `zero_le`. It seems like a rather pathological definition because α already has a zero. Note 2 : there is no multiplicative analogue because it does not seem necessary. Mathematicians might be more likely to use the order-dual version, where all elements are ≤ 1 and then 1 is the top element. -/ /-- If `0` is the least element in `α`, then `WithZero α` is an ordered `AddMonoid`. -/ -- See note [reducible non-instances] protected lemma isOrderedAddMonoid [AddCommMonoid α] [PartialOrder α] [IsOrderedAddMonoid α]	(zero_le : ∀ a : α, 0 ≤ a) : IsOrderedAddMonoid (WithZero α) where add_le_add_left := @add_le_add_left _ _ _ (WithZero.addLeftMono zero_le) /-- Adding a new zero to a canonically ordered additive monoid produces another one. -/ instance instCanonicallyOrderedAdd [AddZeroClass α] [Preorder α] [CanonicallyOrderedAdd α] : CanonicallyOrderedAdd (WithZero α) := { WithZero.instExistsAddOfLE with le_self_add := fun a b => by induction a · exact bot_le induction b · exact le_rfl · exact WithZero.coe_le_coe.2 le_self_add }	Mathlib/Algebra/Order/GroupWithZero/Canonical.lean	370	384
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Yury Kudryashov, Kim Morrison -/ import Mathlib.Algebra.Algebra.Equiv import Mathlib.Algebra.Algebra.NonUnitalHom import Mathlib.Algebra.Module.BigOperators import Mathlib.Algebra.MonoidAlgebra.MapDomain import Mathlib.Data.Finsupp.SMul import Mathlib.LinearAlgebra.Finsupp.SumProd /-! # Monoid algebras -/ noncomputable section open Finset open Finsupp hiding single mapDomain universe u₁ u₂ u₃ u₄ variable (k : Type u₁) (G : Type u₂) (H : Type) {R : Type} /-! ### Multiplicative monoids -/ namespace MonoidAlgebra variable {k G} /-! #### Non-unital, non-associative algebra structure -/ section NonUnitalNonAssocAlgebra variable (k) [Semiring k] [DistribSMul R k] [Mul G] variable {A : Type u₃} [NonUnitalNonAssocSemiring A] /-- A non_unital `k`-algebra homomorphism from `MonoidAlgebra k G` is uniquely defined by its values on the functions `single a 1`. -/ theorem nonUnitalAlgHom_ext [DistribMulAction k A] {φ₁ φ₂ : MonoidAlgebra k G →ₙₐ[k] A} (h : ∀ x, φ₁ (single x 1) = φ₂ (single x 1)) : φ₁ = φ₂ := NonUnitalAlgHom.to_distribMulActionHom_injective <\| Finsupp.distribMulActionHom_ext' fun a => DistribMulActionHom.ext_ring (h a) /-- See note [partially-applied ext lemmas]. -/ @[ext high] theorem nonUnitalAlgHom_ext' [DistribMulAction k A] {φ₁ φ₂ : MonoidAlgebra k G →ₙₐ[k] A} (h : φ₁.toMulHom.comp (ofMagma k G) = φ₂.toMulHom.comp (ofMagma k G)) : φ₁ = φ₂ := nonUnitalAlgHom_ext k <\| DFunLike.congr_fun h /-- The functor `G ↦ MonoidAlgebra k G`, from the category of magmas to the category of non-unital, non-associative algebras over `k` is adjoint to the forgetful functor in the other direction. -/ @[simps apply_apply symm_apply] def liftMagma [Module k A] [IsScalarTower k A A] [SMulCommClass k A A] : (G →ₙ* A) ≃ (MonoidAlgebra k G →ₙₐ[k] A) where toFun f := { liftAddHom fun x => (smulAddHom k A).flip (f x) with toFun := fun a => a.sum fun m t => t • f m map_smul' := fun t' a => by rw [Finsupp.smul_sum, sum_smul_index'] · simp_rw [smul_assoc, MonoidHom.id_apply] · intro m exact zero_smul k (f m) map_mul' := fun a₁ a₂ => by let g : G → k → A := fun m t => t • f m have h₁ : ∀ m, g m 0 = 0 := by intro m exact zero_smul k (f m) have h₂ : ∀ (m) (t₁ t₂ : k), g m (t₁ + t₂) = g m t₁ + g m t₂ := by intros rw [← add_smul] -- Porting note: `reducible` cannot be `local` so proof gets long. simp_rw [Finsupp.mul_sum, Finsupp.sum_mul, smul_mul_smul_comm, ← f.map_mul, mul_def, sum_comm a₂ a₁] rw [sum_sum_index h₁ h₂]; congr; ext rw [sum_sum_index h₁ h₂]; congr; ext rw [sum_single_index (h₁ _)] } invFun F := F.toMulHom.comp (ofMagma k G) left_inv f := by ext m simp only [NonUnitalAlgHom.coe_mk, ofMagma_apply, NonUnitalAlgHom.toMulHom_eq_coe, sum_single_index, Function.comp_apply, one_smul, zero_smul, MulHom.coe_comp, NonUnitalAlgHom.coe_to_mulHom] right_inv F := by ext m simp only [NonUnitalAlgHom.coe_mk, ofMagma_apply, NonUnitalAlgHom.toMulHom_eq_coe, sum_single_index, Function.comp_apply, one_smul, zero_smul, MulHom.coe_comp, NonUnitalAlgHom.coe_to_mulHom] end NonUnitalNonAssocAlgebra /-! #### Algebra structure -/ section Algebra /-- The instance `Algebra k (MonoidAlgebra A G)` whenever we have `Algebra k A`. In particular this provides the instance `Algebra k (MonoidAlgebra k G)`. -/ instance algebra {A : Type} [CommSemiring k] [Semiring A] [Algebra k A] [Monoid G] : Algebra k (MonoidAlgebra A G) where algebraMap := singleOneRingHom.comp (algebraMap k A) smul_def' := fun r a => by ext rw [Finsupp.coe_smul] simp [single_one_mul_apply, Algebra.smul_def, Pi.smul_apply] commutes' := fun r f => by refine Finsupp.ext fun _ => ?_ simp [single_one_mul_apply, mul_single_one_apply, Algebra.commutes] /-- `Finsupp.single 1` as an `AlgHom` -/ @[simps! apply] def singleOneAlgHom {A : Type} [CommSemiring k] [Semiring A] [Algebra k A] [Monoid G] : A →ₐ[k] MonoidAlgebra A G := { singleOneRingHom with commutes' := fun r => by ext simp rfl } @[simp] theorem coe_algebraMap {A : Type} [CommSemiring k] [Semiring A] [Algebra k A] [Monoid G] : ⇑(algebraMap k (MonoidAlgebra A G)) = single 1 ∘ algebraMap k A := rfl theorem single_eq_algebraMap_mul_of [CommSemiring k] [Monoid G] (a : G) (b : k) : single a b = algebraMap k (MonoidAlgebra k G) b of k G a := by simp theorem single_algebraMap_eq_algebraMap_mul_of {A : Type} [CommSemiring k] [Semiring A] [Algebra k A] [Monoid G] (a : G) (b : k) : single a (algebraMap k A b) = algebraMap k (MonoidAlgebra A G) b of A G a := by simp instance isLocalHom_singleOneAlgHom {A : Type} [CommSemiring k] [Semiring A] [Algebra k A] [Monoid G] : IsLocalHom (singleOneAlgHom : A →ₐ[k] MonoidAlgebra A G) where map_nonunit := isLocalHom_singleOneRingHom.map_nonunit instance isLocalHom_algebraMap {A : Type} [CommSemiring k] [Semiring A] [Algebra k A] [Monoid G] [IsLocalHom (algebraMap k A)] : IsLocalHom (algebraMap k (MonoidAlgebra A G)) where map_nonunit _ hx := .of_map _ _ <\| isLocalHom_singleOneAlgHom (k := k).map_nonunit _ hx end Algebra section lift variable [CommSemiring k] [Monoid G] [Monoid H] variable {A : Type u₃} [Semiring A] [Algebra k A] {B : Type} [Semiring B] [Algebra k B] /-- `liftNCRingHom` as an `AlgHom`, for when `f` is an `AlgHom` -/ def liftNCAlgHom (f : A →ₐ[k] B) (g : G → B) (h_comm : ∀ x y, Commute (f x) (g y)) : MonoidAlgebra A G →ₐ[k] B := { liftNCRingHom (f : A →+* B) g h_comm with commutes' := by simp [liftNCRingHom] } /-- A `k`-algebra homomorphism from `MonoidAlgebra k G` is uniquely defined by its values on the functions `single a 1`. -/ theorem algHom_ext ⦃φ₁ φ₂ : MonoidAlgebra k G →ₐ[k] A⦄ (h : ∀ x, φ₁ (single x 1) = φ₂ (single x 1)) : φ₁ = φ₂ := AlgHom.toLinearMap_injective <\| Finsupp.lhom_ext' fun a => LinearMap.ext_ring (h a) -- The priority must be `high`. /-- See note [partially-applied ext lemmas]. -/ @[ext high] theorem algHom_ext' ⦃φ₁ φ₂ : MonoidAlgebra k G →ₐ[k] A⦄ (h : (φ₁ : MonoidAlgebra k G →* A).comp (of k G) = (φ₂ : MonoidAlgebra k G →* A).comp (of k G)) :	φ₁ = φ₂ := algHom_ext <\| DFunLike.congr_fun h	Mathlib/Algebra/MonoidAlgebra/Basic.lean	174	176
/- 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	Mathlib/Probability/Distributions/Gaussian.lean	151	155
/- Copyright (c) 2019 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kim Morrison, Robin Carlier -/ import Mathlib.CategoryTheory.Equivalence /-! # Binary disjoint unions of categories We define the category instance on `C ⊕ D` when `C` and `D` are categories. We define: * `inl_` : the functor `C ⥤ C ⊕ D` * `inr_` : the functor `D ⥤ C ⊕ D` * `swap` : the functor `C ⊕ D ⥤ D ⊕ C` (and the fact this is an equivalence) We provide an induction principle `Sum.homInduction` to reason and work with morphisms in this category. The sum of two functors `F : A ⥤ C` and `G : B ⥤ C` is a functor `A ⊕ B ⥤ C`, written `F.sum' G`. This construction should be preferred when defining functors out of a sum. We provide natural isomorphisms `inlCompSum' : inl_ ⋙ F.sum' G ≅ F` and `inrCompSum' : inl_ ⋙ F.sum' G ≅ G`. Furthermore, we provide `Functor.sumIsoExt`, which constructs a natural isomorphism of functors out of a sum out of natural isomorphism with their precomposition with the inclusion. This construction sholud be preferred when trying to construct isomorphisms between functors out of a sum. We further define sums of functors and natural transformations, written `F.sum G` and `α.sum β`. -/ namespace CategoryTheory universe v₁ v₂ v₃ v₄ u₁ u₂ u₃ u₄ -- morphism levels before object levels. See note [category_theory universes]. open Sum section variable (C : Type u₁) [Category.{v₁} C] (D : Type u₂) [Category.{v₂} D] /- Porting note: `aesop_cat` not firing on `assoc` where autotac in Lean 3 did -/ /-- `sum C D` gives the direct sum of two categories. -/ instance sum : Category.{max v₁ v₂} (C ⊕ D) where Hom X Y := match X, Y with \| inl X, inl Y => ULift.{max v₁ v₂} (X ⟶ Y) \| inl _, inr _ => PEmpty \| inr _, inl _ => PEmpty \| inr X, inr Y => ULift.{max v₁ v₂} (X ⟶ Y) id X := match X with \| inl X => ULift.up (𝟙 X) \| inr X => ULift.up (𝟙 X) comp {X Y Z} f g := match X, Y, Z, f, g with \| inl _, inl _, inl _, f, g => ULift.up <\|f.down ≫ g.down	\| inr _, inr _, inr _, f, g => ULift.up <\| f.down ≫ g.down assoc {W X Y Z} f g h :=	Mathlib/CategoryTheory/Sums/Basic.lean	66	67
/- Copyright (c) 2020 Anne Baanen. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Anne Baanen, Filippo A. E. Nuccio -/ import Mathlib.Algebra.EuclideanDomain.Basic import Mathlib.RingTheory.FractionalIdeal.Basic import Mathlib.RingTheory.IntegralClosure.IsIntegral.Basic import Mathlib.RingTheory.LocalRing.Basic import Mathlib.RingTheory.PrincipalIdealDomain import Mathlib.Tactic.FieldSimp /-! # More operations on fractional ideals ## Main definitions * `map` is the pushforward of a fractional ideal along an algebra morphism Let `K` be the localization of `R` at `R⁰ = R \ {0}` (i.e. the field of fractions). * `FractionalIdeal R⁰ K` is the type of fractional ideals in the field of fractions * `Div (FractionalIdeal R⁰ K)` instance: the ideal quotient `I / J` (typically written $I : J$, but a `:` operator cannot be defined) ## Main statement * `isNoetherian` states that every fractional ideal of a noetherian integral domain is noetherian ## References * https://en.wikipedia.org/wiki/Fractional_ideal ## Tags fractional ideal, fractional ideals, invertible ideal -/ open IsLocalization Pointwise nonZeroDivisors namespace FractionalIdeal open Set Submodule variable {R : Type} [CommRing R] {S : Submonoid R} {P : Type} [CommRing P] variable [Algebra R P] section variable {P' : Type} [CommRing P'] [Algebra R P'] variable {P'' : Type} [CommRing P''] [Algebra R P''] theorem _root_.IsFractional.map (g : P →ₐ[R] P') {I : Submodule R P} : IsFractional S I → IsFractional S (Submodule.map g.toLinearMap I) \| ⟨a, a_nonzero, hI⟩ => ⟨a, a_nonzero, fun b hb => by obtain ⟨b', b'_mem, hb'⟩ := Submodule.mem_map.mp hb rw [AlgHom.toLinearMap_apply] at hb' obtain ⟨x, hx⟩ := hI b' b'_mem use x rw [← g.commutes, hx, map_smul, hb']⟩ /-- `I.map g` is the pushforward of the fractional ideal `I` along the algebra morphism `g` -/ def map (g : P →ₐ[R] P') : FractionalIdeal S P → FractionalIdeal S P' := fun I => ⟨Submodule.map g.toLinearMap I, I.isFractional.map g⟩ @[simp, norm_cast] theorem coe_map (g : P →ₐ[R] P') (I : FractionalIdeal S P) : ↑(map g I) = Submodule.map g.toLinearMap I := rfl @[simp] theorem mem_map {I : FractionalIdeal S P} {g : P →ₐ[R] P'} {y : P'} : y ∈ I.map g ↔ ∃ x, x ∈ I ∧ g x = y := Submodule.mem_map variable (I J : FractionalIdeal S P) (g : P →ₐ[R] P') @[simp] theorem map_id : I.map (AlgHom.id _ _) = I := coeToSubmodule_injective (Submodule.map_id (I : Submodule R P)) @[simp] theorem map_comp (g' : P' →ₐ[R] P'') : I.map (g'.comp g) = (I.map g).map g' := coeToSubmodule_injective (Submodule.map_comp g.toLinearMap g'.toLinearMap I) @[simp, norm_cast] theorem map_coeIdeal (I : Ideal R) : (I : FractionalIdeal S P).map g = I := by ext x simp only [mem_coeIdeal] constructor · rintro ⟨_, ⟨y, hy, rfl⟩, rfl⟩ exact ⟨y, hy, (g.commutes y).symm⟩ · rintro ⟨y, hy, rfl⟩ exact ⟨_, ⟨y, hy, rfl⟩, g.commutes y⟩ @[simp] protected theorem map_one : (1 : FractionalIdeal S P).map g = 1 := map_coeIdeal g ⊤ @[simp] protected theorem map_zero : (0 : FractionalIdeal S P).map g = 0 := map_coeIdeal g 0 @[simp] protected theorem map_add : (I + J).map g = I.map g + J.map g := coeToSubmodule_injective (Submodule.map_sup _ _ _) @[simp] protected theorem map_mul : (I * J).map g = I.map g * J.map g := by simp only [mul_def] exact coeToSubmodule_injective (Submodule.map_mul _ _ _) @[simp] theorem map_map_symm (g : P ≃ₐ[R] P') : (I.map (g : P →ₐ[R] P')).map (g.symm : P' →ₐ[R] P) = I := by rw [← map_comp, g.symm_comp, map_id] @[simp] theorem map_symm_map (I : FractionalIdeal S P') (g : P ≃ₐ[R] P') : (I.map (g.symm : P' →ₐ[R] P)).map (g : P →ₐ[R] P') = I := by rw [← map_comp, g.comp_symm, map_id] theorem map_mem_map {f : P →ₐ[R] P'} (h : Function.Injective f) {x : P} {I : FractionalIdeal S P} : f x ∈ map f I ↔ x ∈ I := mem_map.trans ⟨fun ⟨_, hx', x'_eq⟩ => h x'_eq ▸ hx', fun h => ⟨x, h, rfl⟩⟩ theorem map_injective (f : P →ₐ[R] P') (h : Function.Injective f) : Function.Injective (map f : FractionalIdeal S P → FractionalIdeal S P') := fun _ _ hIJ => ext fun _ => (map_mem_map h).symm.trans (hIJ.symm ▸ map_mem_map h) /-- If `g` is an equivalence, `map g` is an isomorphism -/ def mapEquiv (g : P ≃ₐ[R] P') : FractionalIdeal S P ≃+* FractionalIdeal S P' where toFun := map g invFun := map g.symm map_add' I J := FractionalIdeal.map_add I J _ map_mul' I J := FractionalIdeal.map_mul I J _ left_inv I := by rw [← map_comp, AlgEquiv.symm_comp, map_id] right_inv I := by rw [← map_comp, AlgEquiv.comp_symm, map_id] @[simp] theorem coeFun_mapEquiv (g : P ≃ₐ[R] P') : (mapEquiv g : FractionalIdeal S P → FractionalIdeal S P') = map g := rfl @[simp] theorem mapEquiv_apply (g : P ≃ₐ[R] P') (I : FractionalIdeal S P) : mapEquiv g I = map (↑g) I := rfl @[simp] theorem mapEquiv_symm (g : P ≃ₐ[R] P') : ((mapEquiv g).symm : FractionalIdeal S P' ≃+* _) = mapEquiv g.symm := rfl @[simp] theorem mapEquiv_refl : mapEquiv AlgEquiv.refl = RingEquiv.refl (FractionalIdeal S P) := RingEquiv.ext fun x => by simp theorem isFractional_span_iff {s : Set P} : IsFractional S (span R s) ↔ ∃ a ∈ S, ∀ b : P, b ∈ s → IsInteger R (a • b) := ⟨fun ⟨a, a_mem, h⟩ => ⟨a, a_mem, fun b hb => h b (subset_span hb)⟩, fun ⟨a, a_mem, h⟩ => ⟨a, a_mem, fun _ hb => span_induction (hx := hb) h (by rw [smul_zero] exact isInteger_zero) (fun x y _ _ hx hy => by rw [smul_add] exact isInteger_add hx hy) fun s x _ hx => by rw [smul_comm] exact isInteger_smul hx⟩⟩ theorem isFractional_of_fg [IsLocalization S P] {I : Submodule R P} (hI : I.FG) : IsFractional S I := by rcases hI with ⟨I, rfl⟩ rcases exist_integer_multiples_of_finset S I with ⟨⟨s, hs1⟩, hs⟩ rw [isFractional_span_iff] exact ⟨s, hs1, hs⟩ theorem mem_span_mul_finite_of_mem_mul {I J : FractionalIdeal S P} {x : P} (hx : x ∈ I * J) : ∃ T T' : Finset P, (T : Set P) ⊆ I ∧ (T' : Set P) ⊆ J ∧ x ∈ span R (T * T' : Set P) := Submodule.mem_span_mul_finite_of_mem_mul (by simpa using mem_coe.mpr hx) variable (S) in theorem coeIdeal_fg (inj : Function.Injective (algebraMap R P)) (I : Ideal R) : FG ((I : FractionalIdeal S P) : Submodule R P) ↔ I.FG := coeSubmodule_fg _ inj _ theorem fg_unit (I : (FractionalIdeal S P)ˣ) : FG (I : Submodule R P) := Submodule.fg_unit <\| Units.map (coeSubmoduleHom S P).toMonoidHom I theorem fg_of_isUnit (I : FractionalIdeal S P) (h : IsUnit I) : FG (I : Submodule R P) := fg_unit h.unit theorem _root_.Ideal.fg_of_isUnit (inj : Function.Injective (algebraMap R P)) (I : Ideal R) (h : IsUnit (I : FractionalIdeal S P)) : I.FG := by rw [← coeIdeal_fg S inj I] exact FractionalIdeal.fg_of_isUnit (R := R) I h variable (S P P') variable [IsLocalization S P] [IsLocalization S P'] /-- `canonicalEquiv f f'` is the canonical equivalence between the fractional ideals in `P` and in `P'`, which are both localizations of `R` at `S`. -/ noncomputable irreducible_def canonicalEquiv : FractionalIdeal S P ≃+* FractionalIdeal S P' := mapEquiv { ringEquivOfRingEquiv P P' (RingEquiv.refl R) (show S.map _ = S by rw [RingEquiv.toMonoidHom_refl, Submonoid.map_id]) with commutes' := fun _ => ringEquivOfRingEquiv_eq _ _ } @[simp] theorem mem_canonicalEquiv_apply {I : FractionalIdeal S P} {x : P'} : x ∈ canonicalEquiv S P P' I ↔ ∃ y ∈ I, IsLocalization.map P' (RingHom.id R) (fun y (hy : y ∈ S) => show RingHom.id R y ∈ S from hy) (y : P) = x := by rw [canonicalEquiv, mapEquiv_apply, mem_map] exact ⟨fun ⟨y, mem, Eq⟩ => ⟨y, mem, Eq⟩, fun ⟨y, mem, Eq⟩ => ⟨y, mem, Eq⟩⟩ @[simp] theorem canonicalEquiv_symm : (canonicalEquiv S P P').symm = canonicalEquiv S P' P := RingEquiv.ext fun I => SetLike.ext_iff.mpr fun x => by rw [mem_canonicalEquiv_apply, canonicalEquiv, mapEquiv_symm, mapEquiv_apply, mem_map] exact ⟨fun ⟨y, mem, Eq⟩ => ⟨y, mem, Eq⟩, fun ⟨y, mem, Eq⟩ => ⟨y, mem, Eq⟩⟩ theorem canonicalEquiv_flip (I) : canonicalEquiv S P P' (canonicalEquiv S P' P I) = I := by rw [← canonicalEquiv_symm, RingEquiv.symm_apply_apply] @[simp] theorem canonicalEquiv_canonicalEquiv (P'' : Type) [CommRing P''] [Algebra R P''] [IsLocalization S P''] (I : FractionalIdeal S P) : canonicalEquiv S P' P'' (canonicalEquiv S P P' I) = canonicalEquiv S P P'' I := by ext simp only [IsLocalization.map_map, RingHomInvPair.comp_eq₂, mem_canonicalEquiv_apply, exists_prop, exists_exists_and_eq_and] theorem canonicalEquiv_trans_canonicalEquiv (P'' : Type) [CommRing P''] [Algebra R P''] [IsLocalization S P''] : (canonicalEquiv S P P').trans (canonicalEquiv S P' P'') = canonicalEquiv S P P'' := RingEquiv.ext (canonicalEquiv_canonicalEquiv S P P' P'') @[simp] theorem canonicalEquiv_coeIdeal (I : Ideal R) : canonicalEquiv S P P' I = I := by ext simp [IsLocalization.map_eq] @[simp] theorem canonicalEquiv_self : canonicalEquiv S P P = RingEquiv.refl _ := by rw [← canonicalEquiv_trans_canonicalEquiv S P P] convert (canonicalEquiv S P P).symm_trans_self exact (canonicalEquiv_symm S P P).symm end section IsFractionRing /-! ### `IsFractionRing` section This section concerns fractional ideals in the field of fractions, i.e. the type `FractionalIdeal R⁰ K` where `IsFractionRing R K`. -/ variable {K K' : Type} [Field K] [Field K'] variable [Algebra R K] [IsFractionRing R K] [Algebra R K'] [IsFractionRing R K'] variable {I J : FractionalIdeal R⁰ K} (h : K →ₐ[R] K') /-- Nonzero fractional ideals contain a nonzero integer. -/ theorem exists_ne_zero_mem_isInteger [Nontrivial R] (hI : I ≠ 0) : ∃ x, x ≠ 0 ∧ algebraMap R K x ∈ I := by obtain ⟨y : K, y_mem, y_not_mem⟩ := SetLike.exists_of_lt (by simpa only using bot_lt_iff_ne_bot.mpr hI) have y_ne_zero : y ≠ 0 := by simpa using y_not_mem obtain ⟨z, ⟨x, hx⟩⟩ := exists_integer_multiple R⁰ y refine ⟨x, ?_, ?_⟩ · rw [Ne, ← @IsFractionRing.to_map_eq_zero_iff R _ K, hx, Algebra.smul_def] exact mul_ne_zero (IsFractionRing.to_map_ne_zero_of_mem_nonZeroDivisors z.2) y_ne_zero · rw [hx] exact smul_mem _ _ y_mem theorem map_ne_zero [Nontrivial R] (hI : I ≠ 0) : I.map h ≠ 0 := by obtain ⟨x, x_ne_zero, hx⟩ := exists_ne_zero_mem_isInteger hI contrapose! x_ne_zero with map_eq_zero refine IsFractionRing.to_map_eq_zero_iff.mp (eq_zero_iff.mp map_eq_zero _ (mem_map.mpr ?_)) exact ⟨algebraMap R K x, hx, h.commutes x⟩ @[simp] theorem map_eq_zero_iff [Nontrivial R] : I.map h = 0 ↔ I = 0 := ⟨not_imp_not.mp (map_ne_zero _), fun hI => hI.symm ▸ FractionalIdeal.map_zero h⟩ theorem coeIdeal_injective : Function.Injective (fun (I : Ideal R) ↦ (I : FractionalIdeal R⁰ K)) := coeIdeal_injective' le_rfl theorem coeIdeal_inj {I J : Ideal R} : (I : FractionalIdeal R⁰ K) = (J : FractionalIdeal R⁰ K) ↔ I = J := coeIdeal_inj' le_rfl @[simp] theorem coeIdeal_eq_zero {I : Ideal R} : (I : FractionalIdeal R⁰ K) = 0 ↔ I = ⊥ := coeIdeal_eq_zero' le_rfl theorem coeIdeal_ne_zero {I : Ideal R} : (I : FractionalIdeal R⁰ K) ≠ 0 ↔ I ≠ ⊥ := coeIdeal_ne_zero' le_rfl @[simp] theorem coeIdeal_eq_one {I : Ideal R} : (I : FractionalIdeal R⁰ K) = 1 ↔ I = 1 := by simpa only [Ideal.one_eq_top] using coeIdeal_inj theorem coeIdeal_ne_one {I : Ideal R} : (I : FractionalIdeal R⁰ K) ≠ 1 ↔ I ≠ 1 := not_iff_not.mpr coeIdeal_eq_one theorem num_eq_zero_iff [Nontrivial R] {I : FractionalIdeal R⁰ K} : I.num = 0 ↔ I = 0 := ⟨fun h ↦ zero_of_num_eq_bot zero_not_mem_nonZeroDivisors h, fun h ↦ h ▸ num_zero_eq (IsFractionRing.injective R K)⟩ end IsFractionRing section Quotient /-! ### `quotient` section This section defines the ideal quotient of fractional ideals. In this section we need that each non-zero `y : R` has an inverse in the localization, i.e. that the localization is a field. We satisfy this assumption by taking `S = nonZeroDivisors R`, `R`'s localization at which is a field because `R` is a domain. -/ variable {R₁ : Type} [CommRing R₁] {K : Type} [Field K] variable [Algebra R₁ K] instance : Nontrivial (FractionalIdeal R₁⁰ K) := ⟨⟨0, 1, fun h => have this : (1 : K) ∈ (0 : FractionalIdeal R₁⁰ K) := by rw [← (algebraMap R₁ K).map_one] simpa only [h] using coe_mem_one R₁⁰ 1 one_ne_zero ((mem_zero_iff _).mp this)⟩⟩ theorem ne_zero_of_mul_eq_one (I J : FractionalIdeal R₁⁰ K) (h : I J = 1) : I ≠ 0 := fun hI => zero_ne_one' (FractionalIdeal R₁⁰ K) (by convert h simp [hI]) variable [IsFractionRing R₁ K] [IsDomain R₁] theorem _root_.IsFractional.div_of_nonzero {I J : Submodule R₁ K} : IsFractional R₁⁰ I → IsFractional R₁⁰ J → J ≠ 0 → IsFractional R₁⁰ (I / J) \| ⟨aI, haI, hI⟩, ⟨aJ, haJ, hJ⟩, h => by obtain ⟨y, mem_J, not_mem_zero⟩ := SetLike.exists_of_lt (show 0 < J by simpa only using bot_lt_iff_ne_bot.mpr h) obtain ⟨y', hy'⟩ := hJ y mem_J use aI * y' constructor · apply (nonZeroDivisors R₁).mul_mem haI (mem_nonZeroDivisors_iff_ne_zero.mpr _) intro y'_eq_zero have : algebraMap R₁ K aJ * y = 0 := by rw [← Algebra.smul_def, ← hy', y'_eq_zero, RingHom.map_zero] have y_zero := (mul_eq_zero.mp this).resolve_left (mt ((injective_iff_map_eq_zero (algebraMap R₁ K)).1 (IsFractionRing.injective _ _) _) (mem_nonZeroDivisors_iff_ne_zero.mp haJ)) apply not_mem_zero simpa intro b hb convert hI _ (hb _ (Submodule.smul_mem _ aJ mem_J)) using 1 rw [← hy', mul_comm b, ← Algebra.smul_def, mul_smul] theorem fractional_div_of_nonzero {I J : FractionalIdeal R₁⁰ K} (h : J ≠ 0) : IsFractional R₁⁰ (I / J : Submodule R₁ K) := I.isFractional.div_of_nonzero J.isFractional fun H => h <\| coeToSubmodule_injective <\| H.trans coe_zero.symm open Classical in noncomputable instance : Div (FractionalIdeal R₁⁰ K) := ⟨fun I J => if h : J = 0 then 0 else ⟨I / J, fractional_div_of_nonzero h⟩⟩ variable {I J : FractionalIdeal R₁⁰ K} @[simp] theorem div_zero {I : FractionalIdeal R₁⁰ K} : I / 0 = 0 := dif_pos rfl theorem div_nonzero {I J : FractionalIdeal R₁⁰ K} (h : J ≠ 0) : I / J = ⟨I / J, fractional_div_of_nonzero h⟩ := dif_neg h @[simp] theorem coe_div {I J : FractionalIdeal R₁⁰ K} (hJ : J ≠ 0) : (↑(I / J) : Submodule R₁ K) = ↑I / (↑J : Submodule R₁ K) := congr_arg _ (dif_neg hJ) theorem mem_div_iff_of_nonzero {I J : FractionalIdeal R₁⁰ K} (h : J ≠ 0) {x} : x ∈ I / J ↔ ∀ y ∈ J, x * y ∈ I := by rw [div_nonzero h] exact Submodule.mem_div_iff_forall_mul_mem theorem mul_one_div_le_one {I : FractionalIdeal R₁⁰ K} : I * (1 / I) ≤ 1 := by by_cases hI : I = 0 · rw [hI, div_zero, mul_zero] exact zero_le 1 · rw [← coe_le_coe, coe_mul, coe_div hI, coe_one] apply Submodule.mul_one_div_le_one theorem le_self_mul_one_div {I : FractionalIdeal R₁⁰ K} (hI : I ≤ (1 : FractionalIdeal R₁⁰ K)) : I ≤ I * (1 / I) := by by_cases hI_nz : I = 0 · rw [hI_nz, div_zero, mul_zero] · rw [← coe_le_coe, coe_mul, coe_div hI_nz, coe_one] rw [← coe_le_coe, coe_one] at hI exact Submodule.le_self_mul_one_div hI theorem le_div_iff_of_nonzero {I J J' : FractionalIdeal R₁⁰ K} (hJ' : J' ≠ 0) : I ≤ J / J' ↔ ∀ x ∈ I, ∀ y ∈ J', x * y ∈ J := ⟨fun h _ hx => (mem_div_iff_of_nonzero hJ').mp (h hx), fun h x hx => (mem_div_iff_of_nonzero hJ').mpr (h x hx)⟩ theorem le_div_iff_mul_le {I J J' : FractionalIdeal R₁⁰ K} (hJ' : J' ≠ 0) : I ≤ J / J' ↔ I * J' ≤ J := by rw [div_nonzero hJ'] -- Porting note: this used to be { convert; rw }, flipped the order. rw [← coe_le_coe (I := I * J') (J := J), coe_mul] exact Submodule.le_div_iff_mul_le @[simp] theorem div_one {I : FractionalIdeal R₁⁰ K} : I / 1 = I := by rw [div_nonzero (one_ne_zero' (FractionalIdeal R₁⁰ K))] ext constructor <;> intro h · simpa using mem_div_iff_forall_mul_mem.mp h 1 ((algebraMap R₁ K).map_one ▸ coe_mem_one R₁⁰ 1) · apply mem_div_iff_forall_mul_mem.mpr rintro y ⟨y', _, rfl⟩ -- Porting note: this used to be { convert; rw }, flipped the order. rw [mul_comm, Algebra.linearMap_apply, ← Algebra.smul_def] exact Submodule.smul_mem _ y' h theorem eq_one_div_of_mul_eq_one_right (I J : FractionalIdeal R₁⁰ K) (h : I * J = 1) : J = 1 / I := by have hI : I ≠ 0 := ne_zero_of_mul_eq_one I J h suffices h' : I * (1 / I) = 1 from congr_arg Units.inv <\| @Units.ext _ _ (Units.mkOfMulEqOne _ _ h) (Units.mkOfMulEqOne _ _ h') rfl apply le_antisymm · apply mul_le.mpr _ intro x hx y hy rw [mul_comm] exact (mem_div_iff_of_nonzero hI).mp hy x hx rw [← h] apply mul_left_mono I apply (le_div_iff_of_nonzero hI).mpr _ intro y hy x hx rw [mul_comm] exact mul_mem_mul hy hx theorem mul_div_self_cancel_iff {I : FractionalIdeal R₁⁰ K} : I * (1 / I) = 1 ↔ ∃ J, I * J = 1 := ⟨fun h => ⟨1 / I, h⟩, fun ⟨J, hJ⟩ => by rwa [← eq_one_div_of_mul_eq_one_right I J hJ]⟩	variable {K' : Type*} [Field K'] [Algebra R₁ K'] [IsFractionRing R₁ K'] @[simp] protected theorem map_div (I J : FractionalIdeal R₁⁰ K) (h : K ≃ₐ[R₁] K') : (I / J).map (h : K →ₐ[R₁] K') = I.map h / J.map h := by by_cases H : J = 0 · rw [H, div_zero, FractionalIdeal.map_zero, div_zero]	Mathlib/RingTheory/FractionalIdeal/Operations.lean	463	469
/- Copyright (c) 2018 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Julian Kuelshammer -/ import Mathlib.Algebra.CharP.Defs import Mathlib.Algebra.Group.Commute.Basic import Mathlib.Algebra.Group.Pointwise.Set.Finite import Mathlib.Algebra.Group.Subgroup.Finite import Mathlib.Algebra.Module.NatInt import Mathlib.Algebra.Order.Group.Action import Mathlib.Algebra.Order.Ring.Abs import Mathlib.Data.Int.ModEq import Mathlib.Dynamics.PeriodicPts.Lemmas import Mathlib.GroupTheory.Index import Mathlib.NumberTheory.Divisors import Mathlib.Order.Interval.Set.Infinite /-! # Order of an element This file defines the order of an element of a finite group. For a finite group `G` the order of `x ∈ G` is the minimal `n ≥ 1` such that `x ^ n = 1`. ## Main definitions * `IsOfFinOrder` is a predicate on an element `x` of a monoid `G` saying that `x` is of finite order. * `IsOfFinAddOrder` is the additive analogue of `IsOfFinOrder`. * `orderOf x` defines the order of an element `x` of a monoid `G`, by convention its value is `0` if `x` has infinite order. * `addOrderOf` is the additive analogue of `orderOf`. ## Tags order of an element -/ assert_not_exists Field open Function Fintype Nat Pointwise Subgroup Submonoid open scoped Finset variable {G H A α β : Type} section Monoid variable [Monoid G] {a b x y : G} {n m : ℕ} section IsOfFinOrder -- Porting note (https://github.com/leanprover-community/mathlib4/issues/12129): additional beta reduction needed @[to_additive] theorem isPeriodicPt_mul_iff_pow_eq_one (x : G) : IsPeriodicPt (x ·) n 1 ↔ x ^ n = 1 := by rw [IsPeriodicPt, IsFixedPt, mul_left_iterate]; beta_reduce; rw [mul_one] /-- `IsOfFinOrder` is a predicate on an element `x` of a monoid to be of finite order, i.e. there exists `n ≥ 1` such that `x ^ n = 1`. -/ @[to_additive "`IsOfFinAddOrder` is a predicate on an element `a` of an additive monoid to be of finite order, i.e. there exists `n ≥ 1` such that `n • a = 0`."] def IsOfFinOrder (x : G) : Prop := (1 : G) ∈ periodicPts (x * ·) theorem isOfFinAddOrder_ofMul_iff : IsOfFinAddOrder (Additive.ofMul x) ↔ IsOfFinOrder x := Iff.rfl theorem isOfFinOrder_ofAdd_iff {α : Type} [AddMonoid α] {x : α} : IsOfFinOrder (Multiplicative.ofAdd x) ↔ IsOfFinAddOrder x := Iff.rfl @[to_additive] theorem isOfFinOrder_iff_pow_eq_one : IsOfFinOrder x ↔ ∃ n, 0 < n ∧ x ^ n = 1 := by simp [IsOfFinOrder, mem_periodicPts, isPeriodicPt_mul_iff_pow_eq_one] @[to_additive] alias ⟨IsOfFinOrder.exists_pow_eq_one, _⟩ := isOfFinOrder_iff_pow_eq_one @[to_additive] lemma isOfFinOrder_iff_zpow_eq_one {G} [DivisionMonoid G] {x : G} : IsOfFinOrder x ↔ ∃ (n : ℤ), n ≠ 0 ∧ x ^ n = 1 := by rw [isOfFinOrder_iff_pow_eq_one] refine ⟨fun ⟨n, hn, hn'⟩ ↦ ⟨n, Int.natCast_ne_zero_iff_pos.mpr hn, zpow_natCast x n ▸ hn'⟩, fun ⟨n, hn, hn'⟩ ↦ ⟨n.natAbs, Int.natAbs_pos.mpr hn, ?_⟩⟩ rcases (Int.natAbs_eq_iff (a := n)).mp rfl with h \| h · rwa [h, zpow_natCast] at hn' · rwa [h, zpow_neg, inv_eq_one, zpow_natCast] at hn' /-- See also `injective_pow_iff_not_isOfFinOrder`. -/ @[to_additive "See also `injective_nsmul_iff_not_isOfFinAddOrder`."] theorem not_isOfFinOrder_of_injective_pow {x : G} (h : Injective fun n : ℕ => x ^ n) : ¬IsOfFinOrder x := by simp_rw [isOfFinOrder_iff_pow_eq_one, not_exists, not_and] intro n hn_pos hnx rw [← pow_zero x] at hnx rw [h hnx] at hn_pos exact irrefl 0 hn_pos /-- 1 is of finite order in any monoid. -/ @[to_additive (attr := simp) "0 is of finite order in any additive monoid."] theorem IsOfFinOrder.one : IsOfFinOrder (1 : G) := isOfFinOrder_iff_pow_eq_one.mpr ⟨1, Nat.one_pos, one_pow 1⟩ @[to_additive] lemma IsOfFinOrder.pow {n : ℕ} : IsOfFinOrder a → IsOfFinOrder (a ^ n) := by simp_rw [isOfFinOrder_iff_pow_eq_one] rintro ⟨m, hm, ha⟩ exact ⟨m, hm, by simp [pow_right_comm _ n, ha]⟩ @[to_additive] lemma IsOfFinOrder.of_pow {n : ℕ} (h : IsOfFinOrder (a ^ n)) (hn : n ≠ 0) : IsOfFinOrder a := by rw [isOfFinOrder_iff_pow_eq_one] at rcases h with ⟨m, hm, ha⟩ exact ⟨n * m, mul_pos hn.bot_lt hm, by rwa [pow_mul]⟩ @[to_additive (attr := simp)] lemma isOfFinOrder_pow {n : ℕ} : IsOfFinOrder (a ^ n) ↔ IsOfFinOrder a ∨ n = 0 := by rcases Decidable.eq_or_ne n 0 with rfl \| hn · simp · exact ⟨fun h ↦ .inl <\| h.of_pow hn, fun h ↦ (h.resolve_right hn).pow⟩ /-- Elements of finite order are of finite order in submonoids. -/ @[to_additive "Elements of finite order are of finite order in submonoids."] theorem Submonoid.isOfFinOrder_coe {H : Submonoid G} {x : H} : IsOfFinOrder (x : G) ↔ IsOfFinOrder x := by rw [isOfFinOrder_iff_pow_eq_one, isOfFinOrder_iff_pow_eq_one] norm_cast theorem IsConj.isOfFinOrder (h : IsConj x y) : IsOfFinOrder x → IsOfFinOrder y := by simp_rw [isOfFinOrder_iff_pow_eq_one] rintro ⟨n, n_gt_0, eq'⟩ exact ⟨n, n_gt_0, by rw [← isConj_one_right, ← eq']; exact h.pow n⟩ /-- The image of an element of finite order has finite order. -/ @[to_additive "The image of an element of finite additive order has finite additive order."] theorem MonoidHom.isOfFinOrder [Monoid H] (f : G →* H) {x : G} (h : IsOfFinOrder x) : IsOfFinOrder <\| f x := isOfFinOrder_iff_pow_eq_one.mpr <\| by obtain ⟨n, npos, hn⟩ := h.exists_pow_eq_one exact ⟨n, npos, by rw [← f.map_pow, hn, f.map_one]⟩ /-- If a direct product has finite order then so does each component. -/ @[to_additive "If a direct product has finite additive order then so does each component."] theorem IsOfFinOrder.apply {η : Type} {Gs : η → Type} [∀ i, Monoid (Gs i)] {x : ∀ i, Gs i} (h : IsOfFinOrder x) : ∀ i, IsOfFinOrder (x i) := by obtain ⟨n, npos, hn⟩ := h.exists_pow_eq_one exact fun _ => isOfFinOrder_iff_pow_eq_one.mpr ⟨n, npos, (congr_fun hn.symm _).symm⟩ /-- The submonoid generated by an element is a group if that element has finite order. -/ @[to_additive "The additive submonoid generated by an element is an additive group if that element has finite order."] noncomputable abbrev IsOfFinOrder.groupPowers (hx : IsOfFinOrder x) : Group (Submonoid.powers x) := by obtain ⟨hpos, hx⟩ := hx.exists_pow_eq_one.choose_spec exact Submonoid.groupPowers hpos hx end IsOfFinOrder /-- `orderOf x` is the order of the element `x`, i.e. the `n ≥ 1`, s.t. `x ^ n = 1` if it exists. Otherwise, i.e. if `x` is of infinite order, then `orderOf x` is `0` by convention. -/ @[to_additive "`addOrderOf a` is the order of the element `a`, i.e. the `n ≥ 1`, s.t. `n • a = 0` if it exists. Otherwise, i.e. if `a` is of infinite order, then `addOrderOf a` is `0` by convention."] noncomputable def orderOf (x : G) : ℕ := minimalPeriod (x * ·) 1 @[simp] theorem addOrderOf_ofMul_eq_orderOf (x : G) : addOrderOf (Additive.ofMul x) = orderOf x := rfl @[simp] lemma orderOf_ofAdd_eq_addOrderOf {α : Type} [AddMonoid α] (a : α) : orderOf (Multiplicative.ofAdd a) = addOrderOf a := rfl @[to_additive] protected lemma IsOfFinOrder.orderOf_pos (h : IsOfFinOrder x) : 0 < orderOf x := minimalPeriod_pos_of_mem_periodicPts h @[to_additive addOrderOf_nsmul_eq_zero] theorem pow_orderOf_eq_one (x : G) : x ^ orderOf x = 1 := by convert Eq.trans _ (isPeriodicPt_minimalPeriod (x ·) 1) -- Porting note (https://github.com/leanprover-community/mathlib4/issues/12129): additional beta reduction needed in the middle of the rewrite rw [orderOf, mul_left_iterate]; beta_reduce; rw [mul_one] @[to_additive] theorem orderOf_eq_zero (h : ¬IsOfFinOrder x) : orderOf x = 0 := by rwa [orderOf, minimalPeriod, dif_neg] @[to_additive] theorem orderOf_eq_zero_iff : orderOf x = 0 ↔ ¬IsOfFinOrder x := ⟨fun h H ↦ H.orderOf_pos.ne' h, orderOf_eq_zero⟩ @[to_additive] theorem orderOf_eq_zero_iff' : orderOf x = 0 ↔ ∀ n : ℕ, 0 < n → x ^ n ≠ 1 := by simp_rw [orderOf_eq_zero_iff, isOfFinOrder_iff_pow_eq_one, not_exists, not_and] @[to_additive] theorem orderOf_eq_iff {n} (h : 0 < n) : orderOf x = n ↔ x ^ n = 1 ∧ ∀ m, m < n → 0 < m → x ^ m ≠ 1 := by simp_rw [Ne, ← isPeriodicPt_mul_iff_pow_eq_one, orderOf, minimalPeriod] split_ifs with h1 · classical rw [find_eq_iff] simp only [h, true_and] push_neg rfl · rw [iff_false_left h.ne] rintro ⟨h', -⟩ exact h1 ⟨n, h, h'⟩ /-- A group element has finite order iff its order is positive. -/ @[to_additive "A group element has finite additive order iff its order is positive."] theorem orderOf_pos_iff : 0 < orderOf x ↔ IsOfFinOrder x := by rw [iff_not_comm.mp orderOf_eq_zero_iff, pos_iff_ne_zero] @[to_additive] theorem IsOfFinOrder.mono [Monoid β] {y : β} (hx : IsOfFinOrder x) (h : orderOf y ∣ orderOf x) : IsOfFinOrder y := by rw [← orderOf_pos_iff] at hx ⊢; exact Nat.pos_of_dvd_of_pos h hx @[to_additive] theorem pow_ne_one_of_lt_orderOf (n0 : n ≠ 0) (h : n < orderOf x) : x ^ n ≠ 1 := fun j => not_isPeriodicPt_of_pos_of_lt_minimalPeriod n0 h ((isPeriodicPt_mul_iff_pow_eq_one x).mpr j) @[to_additive] theorem orderOf_le_of_pow_eq_one (hn : 0 < n) (h : x ^ n = 1) : orderOf x ≤ n := IsPeriodicPt.minimalPeriod_le hn (by rwa [isPeriodicPt_mul_iff_pow_eq_one]) @[to_additive (attr := simp)] theorem orderOf_one : orderOf (1 : G) = 1 := by rw [orderOf, ← minimalPeriod_id (x := (1 : G)), ← one_mul_eq_id] @[to_additive (attr := simp) AddMonoid.addOrderOf_eq_one_iff] theorem orderOf_eq_one_iff : orderOf x = 1 ↔ x = 1 := by rw [orderOf, minimalPeriod_eq_one_iff_isFixedPt, IsFixedPt, mul_one] @[to_additive (attr := simp) mod_addOrderOf_nsmul] lemma pow_mod_orderOf (x : G) (n : ℕ) : x ^ (n % orderOf x) = x ^ n := calc x ^ (n % orderOf x) = x ^ (n % orderOf x + orderOf x * (n / orderOf x)) := by simp [pow_add, pow_mul, pow_orderOf_eq_one] _ = x ^ n := by rw [Nat.mod_add_div] @[to_additive] theorem orderOf_dvd_of_pow_eq_one (h : x ^ n = 1) : orderOf x ∣ n := IsPeriodicPt.minimalPeriod_dvd ((isPeriodicPt_mul_iff_pow_eq_one _).mpr h) @[to_additive] theorem orderOf_dvd_iff_pow_eq_one {n : ℕ} : orderOf x ∣ n ↔ x ^ n = 1 := ⟨fun h => by rw [← pow_mod_orderOf, Nat.mod_eq_zero_of_dvd h, _root_.pow_zero], orderOf_dvd_of_pow_eq_one⟩ @[to_additive addOrderOf_smul_dvd] theorem orderOf_pow_dvd (n : ℕ) : orderOf (x ^ n) ∣ orderOf x := by rw [orderOf_dvd_iff_pow_eq_one, pow_right_comm, pow_orderOf_eq_one, one_pow] @[to_additive] lemma pow_injOn_Iio_orderOf : (Set.Iio <\| orderOf x).InjOn (x ^ ·) := by simpa only [mul_left_iterate, mul_one] using iterate_injOn_Iio_minimalPeriod (f := (x * ·)) (x := 1) @[to_additive] protected lemma IsOfFinOrder.mem_powers_iff_mem_range_orderOf [DecidableEq G] (hx : IsOfFinOrder x) : y ∈ Submonoid.powers x ↔ y ∈ (Finset.range (orderOf x)).image (x ^ ·) := Finset.mem_range_iff_mem_finset_range_of_mod_eq' hx.orderOf_pos <\| pow_mod_orderOf _ @[to_additive] protected lemma IsOfFinOrder.powers_eq_image_range_orderOf [DecidableEq G] (hx : IsOfFinOrder x) : (Submonoid.powers x : Set G) = (Finset.range (orderOf x)).image (x ^ ·) := Set.ext fun _ ↦ hx.mem_powers_iff_mem_range_orderOf @[to_additive] theorem pow_eq_one_iff_modEq : x ^ n = 1 ↔ n ≡ 0 [MOD orderOf x] := by rw [modEq_zero_iff_dvd, orderOf_dvd_iff_pow_eq_one] @[to_additive] theorem orderOf_map_dvd {H : Type} [Monoid H] (ψ : G → H) (x : G) : orderOf (ψ x) ∣ orderOf x := by apply orderOf_dvd_of_pow_eq_one rw [← map_pow, pow_orderOf_eq_one] apply map_one @[to_additive] theorem exists_pow_eq_self_of_coprime (h : n.Coprime (orderOf x)) : ∃ m : ℕ, (x ^ n) ^ m = x := by by_cases h0 : orderOf x = 0 · rw [h0, coprime_zero_right] at h exact ⟨1, by rw [h, pow_one, pow_one]⟩ by_cases h1 : orderOf x = 1 · exact ⟨0, by rw [orderOf_eq_one_iff.mp h1, one_pow, one_pow]⟩ obtain ⟨m, h⟩ := exists_mul_emod_eq_one_of_coprime h (one_lt_iff_ne_zero_and_ne_one.mpr ⟨h0, h1⟩) exact ⟨m, by rw [← pow_mul, ← pow_mod_orderOf, h, pow_one]⟩ /-- If `x^n = 1`, but `x^(n/p) ≠ 1` for all prime factors `p` of `n`, then `x` has order `n` in `G`. -/ @[to_additive addOrderOf_eq_of_nsmul_and_div_prime_nsmul "If `n * x = 0`, but `n/p * x ≠ 0` for all prime factors `p` of `n`, then `x` has order `n` in `G`."] theorem orderOf_eq_of_pow_and_pow_div_prime (hn : 0 < n) (hx : x ^ n = 1) (hd : ∀ p : ℕ, p.Prime → p ∣ n → x ^ (n / p) ≠ 1) : orderOf x = n := by -- Let `a` be `n/(orderOf x)`, and show `a = 1` obtain ⟨a, ha⟩ := exists_eq_mul_right_of_dvd (orderOf_dvd_of_pow_eq_one hx) suffices a = 1 by simp [this, ha] -- Assume `a` is not one... by_contra h have a_min_fac_dvd_p_sub_one : a.minFac ∣ n := by obtain ⟨b, hb⟩ : ∃ b : ℕ, a = b * a.minFac := exists_eq_mul_left_of_dvd a.minFac_dvd rw [hb, ← mul_assoc] at ha exact Dvd.intro_left (orderOf x * b) ha.symm -- Use the minimum prime factor of `a` as `p`. refine hd a.minFac (Nat.minFac_prime h) a_min_fac_dvd_p_sub_one ?_ rw [← orderOf_dvd_iff_pow_eq_one, Nat.dvd_div_iff_mul_dvd a_min_fac_dvd_p_sub_one, ha, mul_comm, Nat.mul_dvd_mul_iff_left (IsOfFinOrder.orderOf_pos _)] · exact Nat.minFac_dvd a · rw [isOfFinOrder_iff_pow_eq_one] exact Exists.intro n (id ⟨hn, hx⟩) @[to_additive] theorem orderOf_eq_orderOf_iff {H : Type} [Monoid H] {y : H} : orderOf x = orderOf y ↔ ∀ n : ℕ, x ^ n = 1 ↔ y ^ n = 1 := by simp_rw [← isPeriodicPt_mul_iff_pow_eq_one, ← minimalPeriod_eq_minimalPeriod_iff, orderOf] /-- An injective homomorphism of monoids preserves orders of elements. -/ @[to_additive "An injective homomorphism of additive monoids preserves orders of elements."] theorem orderOf_injective {H : Type} [Monoid H] (f : G →* H) (hf : Function.Injective f) (x : G) : orderOf (f x) = orderOf x := by simp_rw [orderOf_eq_orderOf_iff, ← f.map_pow, ← f.map_one, hf.eq_iff, forall_const] /-- A multiplicative equivalence preserves orders of elements. -/ @[to_additive (attr := simp) "An additive equivalence preserves orders of elements."] lemma MulEquiv.orderOf_eq {H : Type} [Monoid H] (e : G ≃ H) (x : G) : orderOf (e x) = orderOf x := orderOf_injective e.toMonoidHom e.injective x @[to_additive] theorem Function.Injective.isOfFinOrder_iff [Monoid H] {f : G →* H} (hf : Injective f) : IsOfFinOrder (f x) ↔ IsOfFinOrder x := by rw [← orderOf_pos_iff, orderOf_injective f hf x, ← orderOf_pos_iff] @[to_additive (attr := norm_cast, simp)] theorem orderOf_submonoid {H : Submonoid G} (y : H) : orderOf (y : G) = orderOf y := orderOf_injective H.subtype Subtype.coe_injective y @[to_additive] theorem orderOf_units {y : Gˣ} : orderOf (y : G) = orderOf y := orderOf_injective (Units.coeHom G) Units.ext y /-- If the order of `x` is finite, then `x` is a unit with inverse `x ^ (orderOf x - 1)`. -/ @[to_additive (attr := simps) "If the additive order of `x` is finite, then `x` is an additive unit with inverse `(addOrderOf x - 1) • x`. "] noncomputable def IsOfFinOrder.unit {M} [Monoid M] {x : M} (hx : IsOfFinOrder x) : Mˣ := ⟨x, x ^ (orderOf x - 1), by rw [← _root_.pow_succ', tsub_add_cancel_of_le (by exact hx.orderOf_pos), pow_orderOf_eq_one], by rw [← _root_.pow_succ, tsub_add_cancel_of_le (by exact hx.orderOf_pos), pow_orderOf_eq_one]⟩ @[to_additive] lemma IsOfFinOrder.isUnit {M} [Monoid M] {x : M} (hx : IsOfFinOrder x) : IsUnit x := ⟨hx.unit, rfl⟩ variable (x) @[to_additive] theorem orderOf_pow' (h : n ≠ 0) : orderOf (x ^ n) = orderOf x / gcd (orderOf x) n := by unfold orderOf rw [← minimalPeriod_iterate_eq_div_gcd h, mul_left_iterate] @[to_additive] lemma orderOf_pow_of_dvd {x : G} {n : ℕ} (hn : n ≠ 0) (dvd : n ∣ orderOf x) : orderOf (x ^ n) = orderOf x / n := by rw [orderOf_pow' _ hn, Nat.gcd_eq_right dvd] @[to_additive] lemma orderOf_pow_orderOf_div {x : G} {n : ℕ} (hx : orderOf x ≠ 0) (hn : n ∣ orderOf x) : orderOf (x ^ (orderOf x / n)) = n := by rw [orderOf_pow_of_dvd _ (Nat.div_dvd_of_dvd hn), Nat.div_div_self hn hx] rw [← Nat.div_mul_cancel hn] at hx; exact left_ne_zero_of_mul hx variable (n) @[to_additive] protected lemma IsOfFinOrder.orderOf_pow (h : IsOfFinOrder x) : orderOf (x ^ n) = orderOf x / gcd (orderOf x) n := by unfold orderOf rw [← minimalPeriod_iterate_eq_div_gcd' h, mul_left_iterate] @[to_additive] lemma Nat.Coprime.orderOf_pow (h : (orderOf y).Coprime m) : orderOf (y ^ m) = orderOf y := by by_cases hg : IsOfFinOrder y · rw [hg.orderOf_pow y m , h.gcd_eq_one, Nat.div_one] · rw [m.coprime_zero_left.1 (orderOf_eq_zero hg ▸ h), pow_one] @[to_additive] lemma IsOfFinOrder.natCard_powers_le_orderOf (ha : IsOfFinOrder a) : Nat.card (powers a : Set G) ≤ orderOf a := by classical simpa [ha.powers_eq_image_range_orderOf, Finset.card_range, Nat.Iio_eq_range] using Finset.card_image_le (s := Finset.range (orderOf a)) @[to_additive] lemma IsOfFinOrder.finite_powers (ha : IsOfFinOrder a) : (powers a : Set G).Finite := by classical rw [ha.powers_eq_image_range_orderOf]; exact Finset.finite_toSet _ namespace Commute variable {x} @[to_additive] theorem orderOf_mul_dvd_lcm (h : Commute x y) : orderOf (x * y) ∣ Nat.lcm (orderOf x) (orderOf y) := by rw [orderOf, ← comp_mul_left] exact Function.Commute.minimalPeriod_of_comp_dvd_lcm h.function_commute_mul_left @[to_additive] theorem orderOf_dvd_lcm_mul (h : Commute x y): orderOf y ∣ Nat.lcm (orderOf x) (orderOf (x * y)) := by by_cases h0 : orderOf x = 0 · rw [h0, lcm_zero_left] apply dvd_zero conv_lhs => rw [← one_mul y, ← pow_orderOf_eq_one x, ← succ_pred_eq_of_pos (Nat.pos_of_ne_zero h0), _root_.pow_succ, mul_assoc] exact (((Commute.refl x).mul_right h).pow_left _).orderOf_mul_dvd_lcm.trans (lcm_dvd_iff.2 ⟨(orderOf_pow_dvd _).trans (dvd_lcm_left _ _), dvd_lcm_right _ _⟩) @[to_additive addOrderOf_add_dvd_mul_addOrderOf] theorem orderOf_mul_dvd_mul_orderOf (h : Commute x y): orderOf (x * y) ∣ orderOf x * orderOf y := dvd_trans h.orderOf_mul_dvd_lcm (lcm_dvd_mul _ _) @[to_additive addOrderOf_add_eq_mul_addOrderOf_of_coprime] theorem orderOf_mul_eq_mul_orderOf_of_coprime (h : Commute x y) (hco : (orderOf x).Coprime (orderOf y)) : orderOf (x * y) = orderOf x * orderOf y := by rw [orderOf, ← comp_mul_left] exact h.function_commute_mul_left.minimalPeriod_of_comp_eq_mul_of_coprime hco /-- Commuting elements of finite order are closed under multiplication. -/ @[to_additive "Commuting elements of finite additive order are closed under addition."] theorem isOfFinOrder_mul (h : Commute x y) (hx : IsOfFinOrder x) (hy : IsOfFinOrder y) : IsOfFinOrder (x * y) := orderOf_pos_iff.mp <\| pos_of_dvd_of_pos h.orderOf_mul_dvd_mul_orderOf <\| mul_pos hx.orderOf_pos hy.orderOf_pos /-- If each prime factor of `orderOf x` has higher multiplicity in `orderOf y`, and `x` commutes with `y`, then `x * y` has the same order as `y`. -/ @[to_additive addOrderOf_add_eq_right_of_forall_prime_mul_dvd "If each prime factor of `addOrderOf x` has higher multiplicity in `addOrderOf y`, and `x` commutes with `y`, then `x + y` has the same order as `y`."] theorem orderOf_mul_eq_right_of_forall_prime_mul_dvd (h : Commute x y) (hy : IsOfFinOrder y) (hdvd : ∀ p : ℕ, p.Prime → p ∣ orderOf x → p * orderOf x ∣ orderOf y) : orderOf (x * y) = orderOf y := by have hoy := hy.orderOf_pos have hxy := dvd_of_forall_prime_mul_dvd hdvd apply orderOf_eq_of_pow_and_pow_div_prime hoy <;> simp only [Ne, ← orderOf_dvd_iff_pow_eq_one] · exact h.orderOf_mul_dvd_lcm.trans (lcm_dvd hxy dvd_rfl) refine fun p hp hpy hd => hp.ne_one ?_ rw [← Nat.dvd_one, ← mul_dvd_mul_iff_right hoy.ne', one_mul, ← dvd_div_iff_mul_dvd hpy] refine (orderOf_dvd_lcm_mul h).trans (lcm_dvd ((dvd_div_iff_mul_dvd hpy).2 ?_) hd) by_cases h : p ∣ orderOf x exacts [hdvd p hp h, (hp.coprime_iff_not_dvd.2 h).mul_dvd_of_dvd_of_dvd hpy hxy] end Commute section PPrime variable {x n} {p : ℕ} [hp : Fact p.Prime] @[to_additive] theorem orderOf_eq_prime_iff : orderOf x = p ↔ x ^ p = 1 ∧ x ≠ 1 := by rw [orderOf, minimalPeriod_eq_prime_iff, isPeriodicPt_mul_iff_pow_eq_one, IsFixedPt, mul_one] /-- The backward direction of `orderOf_eq_prime_iff`. -/ @[to_additive "The backward direction of `addOrderOf_eq_prime_iff`."] theorem orderOf_eq_prime (hg : x ^ p = 1) (hg1 : x ≠ 1) : orderOf x = p := orderOf_eq_prime_iff.mpr ⟨hg, hg1⟩ @[to_additive addOrderOf_eq_prime_pow] theorem orderOf_eq_prime_pow (hnot : ¬x ^ p ^ n = 1) (hfin : x ^ p ^ (n + 1) = 1) : orderOf x = p ^ (n + 1) := by apply minimalPeriod_eq_prime_pow <;> rwa [isPeriodicPt_mul_iff_pow_eq_one] @[to_additive exists_addOrderOf_eq_prime_pow_iff] theorem exists_orderOf_eq_prime_pow_iff : (∃ k : ℕ, orderOf x = p ^ k) ↔ ∃ m : ℕ, x ^ (p : ℕ) ^ m = 1 := ⟨fun ⟨k, hk⟩ => ⟨k, by rw [← hk, pow_orderOf_eq_one]⟩, fun ⟨_, hm⟩ => by obtain ⟨k, _, hk⟩ := (Nat.dvd_prime_pow hp.elim).mp (orderOf_dvd_of_pow_eq_one hm) exact ⟨k, hk⟩⟩ end PPrime /-- The equivalence between `Fin (orderOf x)` and `Submonoid.powers x`, sending `i` to `x ^ i` -/ @[to_additive "The equivalence between `Fin (addOrderOf a)` and `AddSubmonoid.multiples a`, sending `i` to `i • a`"] noncomputable def finEquivPowers {x : G} (hx : IsOfFinOrder x) : Fin (orderOf x) ≃ powers x := Equiv.ofBijective (fun n ↦ ⟨x ^ (n : ℕ), ⟨n, rfl⟩⟩) ⟨fun ⟨_, h₁⟩ ⟨_, h₂⟩ ij ↦ Fin.ext (pow_injOn_Iio_orderOf h₁ h₂ (Subtype.mk_eq_mk.1 ij)), fun ⟨_, i, rfl⟩ ↦ ⟨⟨i % orderOf x, mod_lt _ hx.orderOf_pos⟩, Subtype.eq <\| pow_mod_orderOf _ _⟩⟩ @[to_additive (attr := simp)] lemma finEquivPowers_apply {x : G} (hx : IsOfFinOrder x) {n : Fin (orderOf x)} : finEquivPowers hx n = ⟨x ^ (n : ℕ), n, rfl⟩ := rfl @[to_additive (attr := simp)] lemma finEquivPowers_symm_apply {x : G} (hx : IsOfFinOrder x) (n : ℕ) : (finEquivPowers hx).symm ⟨x ^ n, _, rfl⟩ = ⟨n % orderOf x, Nat.mod_lt _ hx.orderOf_pos⟩ := by rw [Equiv.symm_apply_eq, finEquivPowers_apply, Subtype.mk_eq_mk, ← pow_mod_orderOf, Fin.val_mk] variable {x n} (hx : IsOfFinOrder x) include hx @[to_additive] theorem IsOfFinOrder.pow_eq_pow_iff_modEq : x ^ n = x ^ m ↔ n ≡ m [MOD orderOf x] := by wlog hmn : m ≤ n generalizing m n · rw [eq_comm, ModEq.comm, this (le_of_not_le hmn)] obtain ⟨k, rfl⟩ := Nat.exists_eq_add_of_le hmn rw [pow_add, (hx.isUnit.pow _).mul_eq_left, pow_eq_one_iff_modEq] exact ⟨fun h ↦ Nat.ModEq.add_left _ h, fun h ↦ Nat.ModEq.add_left_cancel' _ h⟩ @[to_additive] lemma IsOfFinOrder.pow_inj_mod {n m : ℕ} : x ^ n = x ^ m ↔ n % orderOf x = m % orderOf x := hx.pow_eq_pow_iff_modEq end Monoid section CancelMonoid variable [LeftCancelMonoid G] {x y : G} {a : G} {m n : ℕ} @[to_additive] theorem pow_eq_pow_iff_modEq : x ^ n = x ^ m ↔ n ≡ m [MOD orderOf x] := by wlog hmn : m ≤ n generalizing m n · rw [eq_comm, ModEq.comm, this (le_of_not_le hmn)] obtain ⟨k, rfl⟩ := Nat.exists_eq_add_of_le hmn rw [← mul_one (x ^ m), pow_add, mul_left_cancel_iff, pow_eq_one_iff_modEq] exact ⟨fun h => Nat.ModEq.add_left _ h, fun h => Nat.ModEq.add_left_cancel' _ h⟩ @[to_additive (attr := simp)] lemma injective_pow_iff_not_isOfFinOrder : Injective (fun n : ℕ ↦ x ^ n) ↔ ¬IsOfFinOrder x := by refine ⟨fun h => not_isOfFinOrder_of_injective_pow h, fun h n m hnm => ?_⟩ rwa [pow_eq_pow_iff_modEq, orderOf_eq_zero_iff.mpr h, modEq_zero_iff] at hnm @[to_additive] lemma pow_inj_mod {n m : ℕ} : x ^ n = x ^ m ↔ n % orderOf x = m % orderOf x := pow_eq_pow_iff_modEq @[to_additive] theorem pow_inj_iff_of_orderOf_eq_zero (h : orderOf x = 0) {n m : ℕ} : x ^ n = x ^ m ↔ n = m := by rw [pow_eq_pow_iff_modEq, h, modEq_zero_iff] @[to_additive] theorem infinite_not_isOfFinOrder {x : G} (h : ¬IsOfFinOrder x) : { y : G \| ¬IsOfFinOrder y }.Infinite := by let s := { n \| 0 < n }.image fun n : ℕ => x ^ n have hs : s ⊆ { y : G \| ¬IsOfFinOrder y } := by rintro - ⟨n, hn : 0 < n, rfl⟩ (contra : IsOfFinOrder (x ^ n)) apply h rw [isOfFinOrder_iff_pow_eq_one] at contra ⊢ obtain ⟨m, hm, hm'⟩ := contra exact ⟨n * m, mul_pos hn hm, by rwa [pow_mul]⟩ suffices s.Infinite by exact this.mono hs contrapose! h have : ¬Injective fun n : ℕ => x ^ n := by have := Set.not_injOn_infinite_finite_image (Set.Ioi_infinite 0) (Set.not_infinite.mp h) contrapose! this exact Set.injOn_of_injective this rwa [injective_pow_iff_not_isOfFinOrder, Classical.not_not] at this @[to_additive (attr := simp)] lemma finite_powers : (powers a : Set G).Finite ↔ IsOfFinOrder a := by refine ⟨fun h ↦ ?_, IsOfFinOrder.finite_powers⟩ obtain ⟨m, n, hmn, ha⟩ := h.exists_lt_map_eq_of_forall_mem (f := fun n : ℕ ↦ a ^ n) (fun n ↦ by simp [mem_powers_iff]) refine isOfFinOrder_iff_pow_eq_one.2 ⟨n - m, tsub_pos_iff_lt.2 hmn, ?_⟩ rw [← mul_left_cancel_iff (a := a ^ m), ← pow_add, add_tsub_cancel_of_le hmn.le, ha, mul_one] @[to_additive (attr := simp)] lemma infinite_powers : (powers a : Set G).Infinite ↔ ¬ IsOfFinOrder a := finite_powers.not /-- See also `orderOf_eq_card_powers`. -/ @[to_additive "See also `addOrder_eq_card_multiples`."] lemma Nat.card_submonoidPowers : Nat.card (powers a) = orderOf a := by classical by_cases ha : IsOfFinOrder a · exact (Nat.card_congr (finEquivPowers ha).symm).trans <\| by simp · have := (infinite_powers.2 ha).to_subtype rw [orderOf_eq_zero ha, Nat.card_eq_zero_of_infinite] end CancelMonoid section Group variable [Group G] {x y : G} {i : ℤ} /-- Inverses of elements of finite order have finite order. -/ @[to_additive (attr := simp) "Inverses of elements of finite additive order have finite additive order."] theorem isOfFinOrder_inv_iff {x : G} : IsOfFinOrder x⁻¹ ↔ IsOfFinOrder x := by simp [isOfFinOrder_iff_pow_eq_one] @[to_additive] alias ⟨IsOfFinOrder.of_inv, IsOfFinOrder.inv⟩ := isOfFinOrder_inv_iff @[to_additive] theorem orderOf_dvd_iff_zpow_eq_one : (orderOf x : ℤ) ∣ i ↔ x ^ i = 1 := by rcases Int.eq_nat_or_neg i with ⟨i, rfl \| rfl⟩ · rw [Int.natCast_dvd_natCast, orderOf_dvd_iff_pow_eq_one, zpow_natCast] · rw [dvd_neg, Int.natCast_dvd_natCast, zpow_neg, inv_eq_one, zpow_natCast, orderOf_dvd_iff_pow_eq_one] @[to_additive (attr := simp)] theorem orderOf_inv (x : G) : orderOf x⁻¹ = orderOf x := by simp [orderOf_eq_orderOf_iff] @[to_additive] theorem orderOf_dvd_sub_iff_zpow_eq_zpow {a b : ℤ} : (orderOf x : ℤ) ∣ a - b ↔ x ^ a = x ^ b := by rw [orderOf_dvd_iff_zpow_eq_one, zpow_sub, mul_inv_eq_one] namespace Subgroup variable {H : Subgroup G} @[to_additive (attr := norm_cast)] lemma orderOf_coe (a : H) : orderOf (a : G) = orderOf a := orderOf_injective H.subtype Subtype.coe_injective _ @[to_additive (attr := simp)] lemma orderOf_mk (a : G) (ha) : orderOf (⟨a, ha⟩ : H) = orderOf a := (orderOf_coe _).symm end Subgroup @[to_additive mod_addOrderOf_zsmul] lemma zpow_mod_orderOf (x : G) (z : ℤ) : x ^ (z % (orderOf x : ℤ)) = x ^ z := calc x ^ (z % (orderOf x : ℤ)) = x ^ (z % orderOf x + orderOf x * (z / orderOf x) : ℤ) := by simp [zpow_add, zpow_mul, pow_orderOf_eq_one] _ = x ^ z := by rw [Int.emod_add_ediv] @[to_additive (attr := simp) zsmul_smul_addOrderOf] theorem zpow_pow_orderOf : (x ^ i) ^ orderOf x = 1 := by by_cases h : IsOfFinOrder x · rw [← zpow_natCast, ← zpow_mul, mul_comm, zpow_mul, zpow_natCast, pow_orderOf_eq_one, one_zpow] · rw [orderOf_eq_zero h, _root_.pow_zero] @[to_additive] theorem IsOfFinOrder.zpow (h : IsOfFinOrder x) {i : ℤ} : IsOfFinOrder (x ^ i) := isOfFinOrder_iff_pow_eq_one.mpr ⟨orderOf x, h.orderOf_pos, zpow_pow_orderOf⟩ @[to_additive] theorem IsOfFinOrder.of_mem_zpowers (h : IsOfFinOrder x) (h' : y ∈ Subgroup.zpowers x) : IsOfFinOrder y := by obtain ⟨k, rfl⟩ := Subgroup.mem_zpowers_iff.mp h' exact h.zpow @[to_additive] theorem orderOf_dvd_of_mem_zpowers (h : y ∈ Subgroup.zpowers x) : orderOf y ∣ orderOf x := by obtain ⟨k, rfl⟩ := Subgroup.mem_zpowers_iff.mp h rw [orderOf_dvd_iff_pow_eq_one] exact zpow_pow_orderOf theorem smul_eq_self_of_mem_zpowers {α : Type} [MulAction G α] (hx : x ∈ Subgroup.zpowers y) {a : α} (hs : y • a = a) : x • a = a := by obtain ⟨k, rfl⟩ := Subgroup.mem_zpowers_iff.mp hx rw [← MulAction.toPerm_apply, ← MulAction.toPermHom_apply, MonoidHom.map_zpow _ y k, MulAction.toPermHom_apply] exact Function.IsFixedPt.perm_zpow (by exact hs) k -- Porting note: help elab'n with `by exact` theorem vadd_eq_self_of_mem_zmultiples {α G : Type} [AddGroup G] [AddAction G α] {x y : G} (hx : x ∈ AddSubgroup.zmultiples y) {a : α} (hs : y +ᵥ a = a) : x +ᵥ a = a := @smul_eq_self_of_mem_zpowers (Multiplicative G) _ _ _ α _ hx a hs attribute [to_additive existing] smul_eq_self_of_mem_zpowers @[to_additive] lemma IsOfFinOrder.mem_powers_iff_mem_zpowers (hx : IsOfFinOrder x) : y ∈ powers x ↔ y ∈ zpowers x := ⟨fun ⟨n, hn⟩ ↦ ⟨n, by simp_all⟩, fun ⟨i, hi⟩ ↦ ⟨(i % orderOf x).natAbs, by dsimp only rwa [← zpow_natCast, Int.natAbs_of_nonneg <\| Int.emod_nonneg _ <\| Int.natCast_ne_zero_iff_pos.2 <\| hx.orderOf_pos, zpow_mod_orderOf]⟩⟩ @[to_additive] lemma IsOfFinOrder.powers_eq_zpowers (hx : IsOfFinOrder x) : (powers x : Set G) = zpowers x := Set.ext fun _ ↦ hx.mem_powers_iff_mem_zpowers @[to_additive] lemma IsOfFinOrder.mem_zpowers_iff_mem_range_orderOf [DecidableEq G] (hx : IsOfFinOrder x) : y ∈ zpowers x ↔ y ∈ (Finset.range (orderOf x)).image (x ^ ·) := hx.mem_powers_iff_mem_zpowers.symm.trans hx.mem_powers_iff_mem_range_orderOf /-- The equivalence between `Fin (orderOf x)` and `Subgroup.zpowers x`, sending `i` to `x ^ i`. -/ @[to_additive "The equivalence between `Fin (addOrderOf a)` and `Subgroup.zmultiples a`, sending `i` to `i • a`."] noncomputable def finEquivZPowers (hx : IsOfFinOrder x) : Fin (orderOf x) ≃ zpowers x := (finEquivPowers hx).trans <\| Equiv.setCongr hx.powers_eq_zpowers @[to_additive] lemma finEquivZPowers_apply (hx : IsOfFinOrder x) {n : Fin (orderOf x)} : finEquivZPowers hx n = ⟨x ^ (n : ℕ), n, zpow_natCast x n⟩ := rfl @[to_additive] lemma finEquivZPowers_symm_apply (hx : IsOfFinOrder x) (n : ℕ) : (finEquivZPowers hx).symm ⟨x ^ n, ⟨n, by simp⟩⟩ = ⟨n % orderOf x, Nat.mod_lt _ hx.orderOf_pos⟩ := by rw [finEquivZPowers, Equiv.symm_trans_apply]; exact finEquivPowers_symm_apply _ n end Group section CommMonoid variable [CommMonoid G] {x y : G} /-- Elements of finite order are closed under multiplication. -/ @[to_additive "Elements of finite additive order are closed under addition."] theorem IsOfFinOrder.mul (hx : IsOfFinOrder x) (hy : IsOfFinOrder y) : IsOfFinOrder (x * y) := (Commute.all x y).isOfFinOrder_mul hx hy end CommMonoid section FiniteMonoid variable [Monoid G] {x : G} {n : ℕ} @[to_additive] theorem sum_card_orderOf_eq_card_pow_eq_one [Fintype G] [DecidableEq G] (hn : n ≠ 0) : ∑ m ∈ divisors n, #{x : G \| orderOf x = m} = #{x : G \| x ^ n = 1} := by refine (Finset.card_biUnion ?_).symm.trans ?_ · simp +contextual [Set.PairwiseDisjoint, Set.Pairwise, disjoint_iff, Finset.ext_iff] · congr; ext; simp [hn, orderOf_dvd_iff_pow_eq_one] @[to_additive] theorem orderOf_le_card_univ [Fintype G] : orderOf x ≤ Fintype.card G := Finset.le_card_of_inj_on_range (x ^ ·) (fun _ _ ↦ Finset.mem_univ _) pow_injOn_Iio_orderOf @[to_additive] theorem orderOf_le_card [Finite G] : orderOf x ≤ Nat.card G := by obtain ⟨⟩ := nonempty_fintype G simpa using orderOf_le_card_univ end FiniteMonoid section FiniteCancelMonoid variable [LeftCancelMonoid G] -- TODO: Of course everything also works for `RightCancelMonoid`. section Finite variable [Finite G] {x y : G} {n : ℕ} -- TODO: Use this to show that a finite left cancellative monoid is a group. @[to_additive] lemma isOfFinOrder_of_finite (x : G) : IsOfFinOrder x := by by_contra h; exact infinite_not_isOfFinOrder h <\| Set.toFinite _ /-- This is the same as `IsOfFinOrder.orderOf_pos` but with one fewer explicit assumption since this is automatic in case of a finite cancellative monoid. -/ @[to_additive "This is the same as `IsOfFinAddOrder.addOrderOf_pos` but with one fewer explicit assumption since this is automatic in case of a finite cancellative additive monoid."] lemma orderOf_pos (x : G) : 0 < orderOf x := (isOfFinOrder_of_finite x).orderOf_pos /-- This is the same as `orderOf_pow'` and `orderOf_pow''` but with one assumption less which is automatic in the case of a finite cancellative monoid. -/ @[to_additive "This is the same as `addOrderOf_nsmul'` and `addOrderOf_nsmul` but with one assumption less which is automatic in the case of a finite cancellative additive monoid."] theorem orderOf_pow (x : G) : orderOf (x ^ n) = orderOf x / gcd (orderOf x) n := (isOfFinOrder_of_finite _).orderOf_pow .. @[to_additive] theorem mem_powers_iff_mem_range_orderOf [DecidableEq G] : y ∈ powers x ↔ y ∈ (Finset.range (orderOf x)).image (x ^ ·) := Finset.mem_range_iff_mem_finset_range_of_mod_eq' (orderOf_pos x) <\| pow_mod_orderOf _ /-- The equivalence between `Submonoid.powers` of two elements `x, y` of the same order, mapping `x ^ i` to `y ^ i`. -/ @[to_additive "The equivalence between `Submonoid.multiples` of two elements `a, b` of the same additive order, mapping `i • a` to `i • b`."] noncomputable def powersEquivPowers (h : orderOf x = orderOf y) : powers x ≃ powers y := (finEquivPowers <\| isOfFinOrder_of_finite _).symm.trans <\| (finCongr h).trans <\| finEquivPowers <\| isOfFinOrder_of_finite _ @[to_additive (attr := simp)] theorem powersEquivPowers_apply (h : orderOf x = orderOf y) (n : ℕ) : powersEquivPowers h ⟨x ^ n, n, rfl⟩ = ⟨y ^ n, n, rfl⟩ := by rw [powersEquivPowers, Equiv.trans_apply, Equiv.trans_apply, finEquivPowers_symm_apply, ← Equiv.eq_symm_apply, finEquivPowers_symm_apply] simp [h] end Finite variable [Fintype G] {x : G} @[to_additive] lemma orderOf_eq_card_powers : orderOf x = Fintype.card (powers x : Submonoid G) := (Fintype.card_fin (orderOf x)).symm.trans <\| Fintype.card_eq.2 ⟨finEquivPowers <\| isOfFinOrder_of_finite _⟩ end FiniteCancelMonoid section FiniteGroup variable [Group G] {x y : G} @[to_additive] theorem zpow_eq_one_iff_modEq {n : ℤ} : x ^ n = 1 ↔ n ≡ 0 [ZMOD orderOf x] := by rw [Int.modEq_zero_iff_dvd, orderOf_dvd_iff_zpow_eq_one] @[to_additive] theorem zpow_eq_zpow_iff_modEq {m n : ℤ} : x ^ m = x ^ n ↔ m ≡ n [ZMOD orderOf x] := by rw [← mul_inv_eq_one, ← zpow_sub, zpow_eq_one_iff_modEq, Int.modEq_iff_dvd, Int.modEq_iff_dvd, zero_sub, neg_sub] @[to_additive (attr := simp)] theorem injective_zpow_iff_not_isOfFinOrder : (Injective fun n : ℤ => x ^ n) ↔ ¬IsOfFinOrder x := by refine ⟨?_, fun h n m hnm => ?_⟩ · simp_rw [isOfFinOrder_iff_pow_eq_one] rintro h ⟨n, hn, hx⟩ exact Nat.cast_ne_zero.2 hn.ne' (h <\| by simpa using hx) rwa [zpow_eq_zpow_iff_modEq, orderOf_eq_zero_iff.2 h, Nat.cast_zero, Int.modEq_zero_iff] at hnm section Finite variable [Finite G] @[to_additive] theorem exists_zpow_eq_one (x : G) : ∃ (i : ℤ) (_ : i ≠ 0), x ^ (i : ℤ) = 1 := by obtain ⟨w, hw1, hw2⟩ := isOfFinOrder_of_finite x refine ⟨w, Int.natCast_ne_zero.mpr (_root_.ne_of_gt hw1), ?_⟩ rw [zpow_natCast] exact (isPeriodicPt_mul_iff_pow_eq_one _).mp hw2 @[to_additive] lemma mem_powers_iff_mem_zpowers : y ∈ powers x ↔ y ∈ zpowers x := (isOfFinOrder_of_finite _).mem_powers_iff_mem_zpowers @[to_additive] lemma powers_eq_zpowers (x : G) : (powers x : Set G) = zpowers x := (isOfFinOrder_of_finite _).powers_eq_zpowers @[to_additive] lemma mem_zpowers_iff_mem_range_orderOf [DecidableEq G] : y ∈ zpowers x ↔ y ∈ (Finset.range (orderOf x)).image (x ^ ·) := (isOfFinOrder_of_finite _).mem_zpowers_iff_mem_range_orderOf /-- The equivalence between `Subgroup.zpowers` of two elements `x, y` of the same order, mapping `x ^ i` to `y ^ i`. -/ @[to_additive "The equivalence between `Subgroup.zmultiples` of two elements `a, b` of the same additive order, mapping `i • a` to `i • b`."] noncomputable def zpowersEquivZPowers (h : orderOf x = orderOf y) : Subgroup.zpowers x ≃ Subgroup.zpowers y := (finEquivZPowers <\| isOfFinOrder_of_finite _).symm.trans <\| (finCongr h).trans <\| finEquivZPowers <\| isOfFinOrder_of_finite _ @[to_additive (attr := simp) zmultiples_equiv_zmultiples_apply] theorem zpowersEquivZPowers_apply (h : orderOf x = orderOf y) (n : ℕ) : zpowersEquivZPowers h ⟨x ^ n, n, zpow_natCast x n⟩ = ⟨y ^ n, n, zpow_natCast y n⟩ := by rw [zpowersEquivZPowers, Equiv.trans_apply, Equiv.trans_apply, finEquivZPowers_symm_apply, ← Equiv.eq_symm_apply, finEquivZPowers_symm_apply] simp [h] end Finite variable [Fintype G] {x : G} {n : ℕ} /-- See also `Nat.card_zpowers`. -/ @[to_additive "See also `Nat.card_zmultiples`."] theorem Fintype.card_zpowers : Fintype.card (zpowers x) = orderOf x := (Fintype.card_eq.2 ⟨finEquivZPowers <\| isOfFinOrder_of_finite _⟩).symm.trans <\| Fintype.card_fin (orderOf x) @[to_additive] theorem card_zpowers_le (a : G) {k : ℕ} (k_pos : k ≠ 0) (ha : a ^ k = 1) : Fintype.card (Subgroup.zpowers a) ≤ k := by rw [Fintype.card_zpowers] apply orderOf_le_of_pow_eq_one k_pos.bot_lt ha open QuotientGroup @[to_additive] theorem orderOf_dvd_card : orderOf x ∣ Fintype.card G := by classical have ft_prod : Fintype ((G ⧸ zpowers x) × zpowers x) := Fintype.ofEquiv G groupEquivQuotientProdSubgroup have ft_s : Fintype (zpowers x) := @Fintype.prodRight _ _ _ ft_prod _ have ft_cosets : Fintype (G ⧸ zpowers x) := @Fintype.prodLeft _ _ _ ft_prod ⟨⟨1, (zpowers x).one_mem⟩⟩ have eq₁ : Fintype.card G = @Fintype.card _ ft_cosets * @Fintype.card _ ft_s := calc Fintype.card G = @Fintype.card _ ft_prod := @Fintype.card_congr _ _ _ ft_prod groupEquivQuotientProdSubgroup _ = @Fintype.card _ (@instFintypeProd _ _ ft_cosets ft_s) := congr_arg (@Fintype.card _) <\| Subsingleton.elim _ _ _ = @Fintype.card _ ft_cosets * @Fintype.card _ ft_s := @Fintype.card_prod _ _ ft_cosets ft_s have eq₂ : orderOf x = @Fintype.card _ ft_s := calc orderOf x = _ := Fintype.card_zpowers.symm _ = _ := congr_arg (@Fintype.card _) <\| Subsingleton.elim _ _ exact Dvd.intro (@Fintype.card (G ⧸ Subgroup.zpowers x) ft_cosets) (by rw [eq₁, eq₂, mul_comm]) @[to_additive] theorem orderOf_dvd_natCard {G : Type} [Group G] (x : G) : orderOf x ∣ Nat.card G := by obtain h \| h := fintypeOrInfinite G · simp only [Nat.card_eq_fintype_card, orderOf_dvd_card] · simp only [card_eq_zero_of_infinite, dvd_zero] @[to_additive] nonrec lemma Subgroup.orderOf_dvd_natCard {G : Type} [Group G] (s : Subgroup G) {x} (hx : x ∈ s) : orderOf x ∣ Nat.card s := by simpa using orderOf_dvd_natCard (⟨x, hx⟩ : s) @[to_additive] lemma Subgroup.orderOf_le_card {G : Type} [Group G] (s : Subgroup G) (hs : (s : Set G).Finite) {x} (hx : x ∈ s) : orderOf x ≤ Nat.card s := le_of_dvd (Nat.card_pos_iff.2 <\| ⟨s.coe_nonempty.to_subtype, hs.to_subtype⟩) <\| s.orderOf_dvd_natCard hx @[to_additive] lemma Submonoid.orderOf_le_card {G : Type} [Group G] (s : Submonoid G) (hs : (s : Set G).Finite) {x} (hx : x ∈ s) : orderOf x ≤ Nat.card s := by rw [← Nat.card_submonoidPowers]; exact Nat.card_mono hs <\| powers_le.2 hx @[to_additive (attr := simp) card_nsmul_eq_zero'] theorem pow_card_eq_one' {G : Type} [Group G] {x : G} : x ^ Nat.card G = 1 := orderOf_dvd_iff_pow_eq_one.mp <\| orderOf_dvd_natCard _ @[to_additive (attr := simp) card_nsmul_eq_zero] theorem pow_card_eq_one : x ^ Fintype.card G = 1 := by rw [← Nat.card_eq_fintype_card, pow_card_eq_one'] @[to_additive] theorem Subgroup.pow_index_mem {G : Type} [Group G] (H : Subgroup G) [Normal H] (g : G) : g ^ index H ∈ H := by rw [← eq_one_iff, QuotientGroup.mk_pow H, index, pow_card_eq_one'] @[to_additive (attr := simp) mod_card_nsmul] lemma pow_mod_card (a : G) (n : ℕ) : a ^ (n % card G) = a ^ n := by rw [eq_comm, ← pow_mod_orderOf, ← Nat.mod_mod_of_dvd n orderOf_dvd_card, pow_mod_orderOf] @[to_additive (attr := simp) mod_card_zsmul] theorem zpow_mod_card (a : G) (n : ℤ) : a ^ (n % Fintype.card G : ℤ) = a ^ n := by rw [eq_comm, ← zpow_mod_orderOf, ← Int.emod_emod_of_dvd n (Int.natCast_dvd_natCast.2 orderOf_dvd_card), zpow_mod_orderOf] @[to_additive (attr := simp) mod_natCard_nsmul] lemma pow_mod_natCard {G} [Group G] (a : G) (n : ℕ) : a ^ (n % Nat.card G) = a ^ n := by rw [eq_comm, ← pow_mod_orderOf, ← Nat.mod_mod_of_dvd n <\| orderOf_dvd_natCard _, pow_mod_orderOf] @[to_additive (attr := simp) mod_natCard_zsmul] lemma zpow_mod_natCard {G} [Group G] (a : G) (n : ℤ) : a ^ (n % Nat.card G : ℤ) = a ^ n := by rw [eq_comm, ← zpow_mod_orderOf, ← Int.emod_emod_of_dvd n <\| Int.natCast_dvd_natCast.2 <\| orderOf_dvd_natCard _, zpow_mod_orderOf] /-- If `gcd(\|G\|,n)=1` then the `n`th power map is a bijection -/ @[to_additive (attr := simps) "If `gcd(\|G\|,n)=1` then the smul by `n` is a bijection"] noncomputable def powCoprime {G : Type} [Group G] (h : (Nat.card G).Coprime n) : G ≃ G where toFun g := g ^ n invFun g := g ^ (Nat.card G).gcdB n left_inv g := by have key := congr_arg (g ^ ·) ((Nat.card G).gcd_eq_gcd_ab n) dsimp only at key rwa [zpow_add, zpow_mul, zpow_mul, zpow_natCast, zpow_natCast, zpow_natCast, h.gcd_eq_one, pow_one, pow_card_eq_one', one_zpow, one_mul, eq_comm] at key right_inv g := by have key := congr_arg (g ^ ·) ((Nat.card G).gcd_eq_gcd_ab n) dsimp only at key rwa [zpow_add, zpow_mul, zpow_mul', zpow_natCast, zpow_natCast, zpow_natCast, h.gcd_eq_one, pow_one, pow_card_eq_one', one_zpow, one_mul, eq_comm] at key @[to_additive] theorem powCoprime_one {G : Type} [Group G] (h : (Nat.card G).Coprime n) : powCoprime h 1 = 1 := one_pow n @[to_additive] theorem powCoprime_inv {G : Type} [Group G] (h : (Nat.card G).Coprime n) {g : G} : powCoprime h g⁻¹ = (powCoprime h g)⁻¹ := inv_pow g n @[to_additive Nat.Coprime.nsmul_right_bijective] lemma Nat.Coprime.pow_left_bijective {G} [Group G] (hn : (Nat.card G).Coprime n) : Bijective (· ^ n : G → G) := (powCoprime hn).bijective /- TODO: Generalise to `Submonoid.powers`. -/ @[to_additive] theorem image_range_orderOf [DecidableEq G] : letI : Fintype (zpowers x) := (Subgroup.zpowers x).instFintypeSubtypeMemOfDecidablePred Finset.image (fun i => x ^ i) (Finset.range (orderOf x)) = (zpowers x : Set G).toFinset := by letI : Fintype (zpowers x) := (Subgroup.zpowers x).instFintypeSubtypeMemOfDecidablePred ext x rw [Set.mem_toFinset, SetLike.mem_coe, mem_zpowers_iff_mem_range_orderOf] /- TODO: Generalise to `Finite` + `CancelMonoid`. -/ @[to_additive gcd_nsmul_card_eq_zero_iff] theorem pow_gcd_card_eq_one_iff : x ^ n = 1 ↔ x ^ gcd n (Fintype.card G) = 1 := ⟨fun h => pow_gcd_eq_one _ h <\| pow_card_eq_one, fun h => by let ⟨m, hm⟩ := gcd_dvd_left n (Fintype.card G) rw [hm, pow_mul, h, one_pow]⟩ lemma smul_eq_of_le_smul {G : Type} [Group G] [Finite G] {α : Type} [PartialOrder α] {g : G} {a : α} [MulAction G α] [CovariantClass G α HSMul.hSMul LE.le] (h : a ≤ g • a) : g • a = a := by have key := smul_mono_right g (le_pow_smul h (Nat.card G - 1)) rw [smul_smul, ← _root_.pow_succ', Nat.sub_one_add_one_eq_of_pos Nat.card_pos, pow_card_eq_one', one_smul] at key exact le_antisymm key h lemma smul_eq_of_smul_le {G : Type} [Group G] [Finite G] {α : Type} [PartialOrder α] {g : G} {a : α} [MulAction G α] [CovariantClass G α HSMul.hSMul LE.le] (h : g • a ≤ a) : g • a = a := by have key := smul_mono_right g (pow_smul_le h (Nat.card G - 1)) rw [smul_smul, ← _root_.pow_succ', Nat.sub_one_add_one_eq_of_pos Nat.card_pos, pow_card_eq_one', one_smul] at key exact le_antisymm h key end FiniteGroup section PowIsSubgroup /-- A nonempty idempotent subset of a finite cancellative monoid is a submonoid -/ @[to_additive "A nonempty idempotent subset of a finite cancellative add monoid is a submonoid"] def submonoidOfIdempotent {M : Type} [LeftCancelMonoid M] [Finite M] (S : Set M) (hS1 : S.Nonempty) (hS2 : S * S = S) : Submonoid M := have pow_mem (a : M) (ha : a ∈ S) (n : ℕ) : a ^ (n + 1) ∈ S := by induction n with \| zero => rwa [zero_add, pow_one] \| succ n ih => rw [← hS2, pow_succ] exact Set.mul_mem_mul ih ha { carrier := S one_mem' := by obtain ⟨a, ha⟩ := hS1 rw [← pow_orderOf_eq_one a, ← tsub_add_cancel_of_le (succ_le_of_lt (orderOf_pos a))] exact pow_mem a ha (orderOf a - 1) mul_mem' := fun ha hb => (congr_arg₂ (· ∈ ·) rfl hS2).mp (Set.mul_mem_mul ha hb) } /-- A nonempty idempotent subset of a finite group is a subgroup -/ @[to_additive "A nonempty idempotent subset of a finite add group is a subgroup"] def subgroupOfIdempotent {G : Type} [Group G] [Finite G] (S : Set G) (hS1 : S.Nonempty) (hS2 : S S = S) : Subgroup G := { submonoidOfIdempotent S hS1 hS2 with carrier := S inv_mem' := fun {a} ha => show a⁻¹ ∈ submonoidOfIdempotent S hS1 hS2 by rw [← one_mul a⁻¹, ← pow_one a, ← pow_orderOf_eq_one a, ← pow_sub a (orderOf_pos a)] exact pow_mem ha (orderOf a - 1) } /-- If `S` is a nonempty subset of a finite group `G`, then `S ^ \|G\|` is a subgroup -/ @[to_additive (attr := simps!) smulCardAddSubgroup "If `S` is a nonempty subset of a finite add group `G`, then `\|G\| • S` is a subgroup"] def powCardSubgroup {G : Type*} [Group G] [Fintype G] (S : Set G) (hS : S.Nonempty) : Subgroup G := have one_mem : (1 : G) ∈ S ^ Fintype.card G := by obtain ⟨a, ha⟩ := hS rw [← pow_card_eq_one] exact Set.pow_mem_pow ha subgroupOfIdempotent (S ^ Fintype.card G) ⟨1, one_mem⟩ <\| by classical apply (Set.eq_of_subset_of_card_le (Set.subset_mul_left _ one_mem) (ge_of_eq _)).symm simp_rw [← pow_add, Group.card_pow_eq_card_pow_card_univ S (Fintype.card G + Fintype.card G) le_add_self] end PowIsSubgroup section LinearOrderedSemiring variable [Semiring G] [LinearOrder G] [IsStrictOrderedRing G] {a : G} protected lemma IsOfFinOrder.eq_one (ha₀ : 0 ≤ a) (ha : IsOfFinOrder a) : a = 1 := by obtain ⟨n, hn, ha⟩ := ha.exists_pow_eq_one exact (pow_eq_one_iff_of_nonneg ha₀ hn.ne').1 ha end LinearOrderedSemiring section LinearOrderedRing variable [Ring G] [LinearOrder G] [IsStrictOrderedRing G] {a x : G} protected lemma IsOfFinOrder.eq_neg_one (ha₀ : a ≤ 0) (ha : IsOfFinOrder a) : a = -1 := (sq_eq_one_iff.1 <\| ha.pow.eq_one <\| sq_nonneg a).resolve_left <\| by rintro rfl; exact one_pos.not_le ha₀ theorem orderOf_abs_ne_one (h : \|x\| ≠ 1) : orderOf x = 0 := by rw [orderOf_eq_zero_iff'] intro n hn hx replace hx : \|x\| ^ n = 1 := by simpa only [abs_one, abs_pow] using congr_arg abs hx rcases h.lt_or_lt with h \| h · exact ((pow_lt_one₀ (abs_nonneg x) h hn.ne').ne hx).elim · exact ((one_lt_pow₀ h hn.ne').ne' hx).elim theorem LinearOrderedRing.orderOf_le_two : orderOf x ≤ 2 := by rcases ne_or_eq \|x\| 1 with h \| h	· simp [orderOf_abs_ne_one h] rcases eq_or_eq_neg_of_abs_eq h with (rfl \| rfl)	Mathlib/GroupTheory/OrderOfElement.lean	1,077	1,078
/- Copyright (c) 2022 Amelia Livingston. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Amelia Livingston -/ import Mathlib.Algebra.Category.ModuleCat.Projective import Mathlib.AlgebraicTopology.ExtraDegeneracy import Mathlib.CategoryTheory.Abelian.Ext import Mathlib.GroupTheory.GroupAction.Ring import Mathlib.RepresentationTheory.Rep import Mathlib.RingTheory.TensorProduct.Free import Mathlib.CategoryTheory.Functor.ReflectsIso.Balanced /-! # The structure of the `k[G]`-module `k[Gⁿ]` This file contains facts about an important `k[G]`-module structure on `k[Gⁿ]`, where `k` is a commutative ring and `G` is a group. The module structure arises from the representation `G →* End(k[Gⁿ])` induced by the diagonal action of `G` on `Gⁿ.` In particular, we define an isomorphism of `k`-linear `G`-representations between `k[Gⁿ⁺¹]` and `k[G] ⊗ₖ k[Gⁿ]` (on which `G` acts by `ρ(g₁)(g₂ ⊗ x) = (g₁ * g₂) ⊗ x`). This allows us to define a `k[G]`-basis on `k[Gⁿ⁺¹]`, by mapping the natural `k[G]`-basis of `k[G] ⊗ₖ k[Gⁿ]` along the isomorphism. We then define the standard resolution of `k` as a trivial representation, by taking the alternating face map complex associated to an appropriate simplicial `k`-linear `G`-representation. This simplicial object is the `Rep.linearization` of the simplicial `G`-set given by the universal cover of the classifying space of `G`, `EG`. We prove this simplicial `G`-set `EG` is isomorphic to the Čech nerve of the natural arrow of `G`-sets `G ⟶ {pt}`. We then use this isomorphism to deduce that as a complex of `k`-modules, the standard resolution of `k` as a trivial `G`-representation is homotopy equivalent to the complex with `k` at 0 and 0 elsewhere. Putting this material together allows us to define `groupCohomology.projectiveResolution`, the standard projective resolution of `k` as a trivial `k`-linear `G`-representation. ## Main definitions * `groupCohomology.resolution.actionDiagonalSucc` * `groupCohomology.resolution.diagonalSucc` * `groupCohomology.resolution.ofMulActionBasis` * `classifyingSpaceUniversalCover` * `groupCohomology.resolution.forget₂ToModuleCatHomotopyEquiv` * `groupCohomology.projectiveResolution` ## Implementation notes We express `k[G]`-module structures on a module `k`-module `V` using the `Representation` definition. We avoid using instances `Module (G →₀ k) V` so that we do not run into possible scalar action diamonds. We also use the category theory library to bundle the type `k[Gⁿ]` - or more generally `k[H]` when `H` has `G`-action - and the representation together, as a term of type `Rep k G`, and call it `Rep.ofMulAction k G H.` This enables us to express the fact that certain maps are `G`-equivariant by constructing morphisms in the category `Rep k G`, i.e., representations of `G` over `k`. -/ /- Porting note: most altered proofs in this file involved changing `simp` to `rw` or `erw`, so https://github.com/leanprover-community/mathlib4/issues/5026 and https://github.com/leanprover-community/mathlib4/issues/5164 are relevant. -/ suppress_compilation noncomputable section universe u v w variable {k G : Type u} [CommRing k] {n : ℕ} open CategoryTheory Finsupp local notation "Gⁿ" => Fin n → G set_option quotPrecheck false local notation "Gⁿ⁺¹" => Fin (n + 1) → G namespace groupCohomology.resolution open Finsupp hiding lift open MonoidalCategory open Fin (partialProd) section Basis variable (k G n) [Group G] section Action open Action /-- An isomorphism of `G`-sets `Gⁿ⁺¹ ≅ G × Gⁿ`, where `G` acts by left multiplication on `Gⁿ⁺¹` and `G` but trivially on `Gⁿ`. The map sends `(g₀, ..., gₙ) ↦ (g₀, (g₀⁻¹g₁, g₁⁻¹g₂, ..., gₙ₋₁⁻¹gₙ))`, and the inverse is `(g₀, (g₁, ..., gₙ)) ↦ (g₀, g₀g₁, g₀g₁g₂, ..., g₀g₁...gₙ).` -/ def actionDiagonalSucc (G : Type u) [Group G] : ∀ n : ℕ, diagonal G (n + 1) ≅ leftRegular G ⊗ Action.mk (Fin n → G) 1 \| 0 => diagonalOneIsoLeftRegular G ≪≫ (ρ_ _).symm ≪≫ tensorIso (Iso.refl _) (tensorUnitIso (Equiv.ofUnique PUnit _).toIso) \| n + 1 => diagonalSucc _ _ ≪≫ tensorIso (Iso.refl _) (actionDiagonalSucc G n) ≪≫ leftRegularTensorIso _ _ ≪≫ tensorIso (Iso.refl _) (mkIso (Fin.insertNthEquiv (fun _ => G) 0).toIso fun _ => rfl) theorem actionDiagonalSucc_hom_apply {G : Type u} [Group G] {n : ℕ} (f : Fin (n + 1) → G) : (actionDiagonalSucc G n).hom.hom f = (f 0, fun i => (f (Fin.castSucc i))⁻¹ * f i.succ) := by induction n with \| zero => exact Prod.ext rfl (funext fun x => Fin.elim0 x) \| succ n hn => refine Prod.ext rfl (funext fun x => ?_) /- Porting note (https://github.com/leanprover-community/mathlib4/issues/11039): broken proof was · dsimp only [actionDiagonalSucc] simp only [Iso.trans_hom, comp_hom, types_comp_apply, diagonalSucc_hom_hom, leftRegularTensorIso_hom_hom, tensorIso_hom, mkIso_hom_hom, Equiv.toIso_hom, Action.tensorHom, Equiv.piFinSuccAbove_symm_apply, tensor_apply, types_id_apply, tensor_rho, MonoidHom.one_apply, End.one_def, hn fun j : Fin (n + 1) => f j.succ, Fin.insertNth_zero'] refine' Fin.cases (Fin.cons_zero _ _) (fun i => _) x · simp only [Fin.cons_succ, mul_left_inj, inv_inj, Fin.castSucc_fin_succ] -/ dsimp [actionDiagonalSucc] erw [hn (fun (j : Fin (n + 1)) => f j.succ)] exact Fin.cases rfl (fun i => rfl) x theorem actionDiagonalSucc_inv_apply {G : Type u} [Group G] {n : ℕ} (g : G) (f : Fin n → G) : (actionDiagonalSucc G n).inv.hom (g, f) = (g • Fin.partialProd f : Fin (n + 1) → G) := by revert g induction n with \| zero => intro g funext (x : Fin 1) simp only [Subsingleton.elim x 0, Pi.smul_apply, Fin.partialProd_zero, smul_eq_mul, mul_one] rfl \| succ n hn => intro g /- Porting note (https://github.com/leanprover-community/mathlib4/issues/11039): broken proof was ext dsimp only [actionDiagonalSucc] simp only [Iso.trans_inv, comp_hom, hn, diagonalSucc_inv_hom, types_comp_apply, tensorIso_inv, Iso.refl_inv, Action.tensorHom, id_hom, tensor_apply, types_id_apply, leftRegularTensorIso_inv_hom, tensor_ρ, leftRegular_ρ_apply, Pi.smul_apply, smul_eq_mul] refine' Fin.cases _ _ x · simp only [Fin.cons_zero, Fin.partialProd_zero, mul_one] · intro i simpa only [Fin.cons_succ, Pi.smul_apply, smul_eq_mul, Fin.partialProd_succ', mul_assoc] -/ funext x dsimp [actionDiagonalSucc] erw [hn, Fin.consEquiv_apply] refine Fin.cases ?_ (fun i => ?_) x · simp only [Fin.insertNth_zero, Fin.cons_zero, Fin.partialProd_zero, mul_one] · simp only [Fin.cons_succ, Pi.smul_apply, smul_eq_mul, Fin.partialProd_succ', ← mul_assoc] rfl end Action section Rep open Rep /-- An isomorphism of `k`-linear representations of `G` from `k[Gⁿ⁺¹]` to `k[G] ⊗ₖ k[Gⁿ]` (on which `G` acts by `ρ(g₁)(g₂ ⊗ x) = (g₁ * g₂) ⊗ x`) sending `(g₀, ..., gₙ)` to `g₀ ⊗ (g₀⁻¹g₁, g₁⁻¹g₂, ..., gₙ₋₁⁻¹gₙ)`. The inverse sends `g₀ ⊗ (g₁, ..., gₙ)` to `(g₀, g₀g₁, ..., g₀g₁...gₙ)`. -/ def diagonalSucc (n : ℕ) : diagonal k G (n + 1) ≅ leftRegular k G ⊗ trivial k G ((Fin n → G) →₀ k) := (linearization k G).mapIso (actionDiagonalSucc G n) ≪≫ (Functor.Monoidal.μIso (linearization k G) _ _).symm ≪≫ tensorIso (Iso.refl _) (linearizationTrivialIso k G (Fin n → G)) variable {k G n} theorem diagonalSucc_hom_single (f : Gⁿ⁺¹) (a : k) : (diagonalSucc k G n).hom.hom (single f a) = single (f 0) 1 ⊗ₜ single (fun i => (f (Fin.castSucc i))⁻¹ * f i.succ) a := by	dsimp [diagonalSucc] erw [lmapDomain_apply, mapDomain_single, LinearEquiv.coe_toLinearMap, finsuppTensorFinsupp', LinearEquiv.trans_symm, LinearEquiv.trans_apply, lcongr_symm, Equiv.refl_symm] erw [lcongr_single] rw [TensorProduct.lid_symm_apply, actionDiagonalSucc_hom_apply, finsuppTensorFinsupp_symm_single] rfl theorem diagonalSucc_inv_single_single (g : G) (f : Gⁿ) (a b : k) : (diagonalSucc k G n).inv.hom (Finsupp.single g a ⊗ₜ Finsupp.single f b) = single (g • partialProd f) (a * b) := by /- Porting note (https://github.com/leanprover-community/mathlib4/issues/11039): broken proof was dsimp only [diagonalSucc] simp only [Iso.trans_inv, Iso.symm_inv, Iso.refl_inv, tensorIso_inv, Action.tensorHom, Action.comp_hom, ModuleCat.comp_def, LinearMap.comp_apply, asIso_hom, Functor.mapIso_inv, ModuleCat.MonoidalCategory.hom_apply, linearizationTrivialIso_inv_hom_apply, linearization_μ_hom, Action.id_hom ((linearization k G).obj _), actionDiagonalSucc_inv_apply, ModuleCat.id_apply, LinearEquiv.coe_toLinearMap, finsuppTensorFinsupp'_single_tmul_single k (Action.leftRegular G).V, linearization_map_hom_single (actionDiagonalSucc G n).inv (g, f) (a * b)] -/ change mapDomain (actionDiagonalSucc G n).inv.hom (lcongr (Equiv.refl (G × (Fin n → G))) (TensorProduct.lid k k) (finsuppTensorFinsupp k k k k G (Fin n → G) (single g a ⊗ₜ[k] single f b)))	Mathlib/RepresentationTheory/GroupCohomology/Resolution.lean	179	200
/- Copyright (c) 2020 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel, Sophie Morel, Yury Kudryashov -/ import Mathlib.Analysis.NormedSpace.OperatorNorm.NormedSpace import Mathlib.Logic.Embedding.Basic import Mathlib.Data.Fintype.CardEmbedding import Mathlib.Topology.Algebra.Module.Multilinear.Topology /-! # Operator norm on the space of continuous multilinear maps When `f` is a continuous multilinear map in finitely many variables, we define its norm `‖f‖` as the smallest number such that `‖f m‖ ≤ ‖f‖ * ∏ i, ‖m i‖` for all `m`. We show that it is indeed a norm, and prove its basic properties. ## Main results Let `f` be a multilinear map in finitely many variables. * `exists_bound_of_continuous` asserts that, if `f` is continuous, then there exists `C > 0` with `‖f m‖ ≤ C * ∏ i, ‖m i‖` for all `m`. * `continuous_of_bound`, conversely, asserts that this bound implies continuity. * `mkContinuous` constructs the associated continuous multilinear map. Let `f` be a continuous multilinear map in finitely many variables. * `‖f‖` is its norm, i.e., the smallest number such that `‖f m‖ ≤ ‖f‖ * ∏ i, ‖m i‖` for all `m`. * `le_opNorm f m` asserts the fundamental inequality `‖f m‖ ≤ ‖f‖ * ∏ i, ‖m i‖`. * `norm_image_sub_le f m₁ m₂` gives a control of the difference `f m₁ - f m₂` in terms of `‖f‖` and `‖m₁ - m₂‖`. ## Implementation notes We mostly follow the API (and the proofs) of `OperatorNorm.lean`, with the additional complexity that we should deal with multilinear maps in several variables. From the mathematical point of view, all the results follow from the results on operator norm in one variable, by applying them to one variable after the other through currying. However, this is only well defined when there is an order on the variables (for instance on `Fin n`) although the final result is independent of the order. While everything could be done following this approach, it turns out that direct proofs are easier and more efficient. -/ suppress_compilation noncomputable section open scoped NNReal Topology Uniformity open Finset Metric Function Filter /-! ### Type variables We use the following type variables in this file: * `𝕜` : a `NontriviallyNormedField`; * `ι`, `ι'` : finite index types with decidable equality; * `E`, `E₁` : families of normed vector spaces over `𝕜` indexed by `i : ι`; * `E'` : a family of normed vector spaces over `𝕜` indexed by `i' : ι'`; * `Ei` : a family of normed vector spaces over `𝕜` indexed by `i : Fin (Nat.succ n)`; * `G`, `G'` : normed vector spaces over `𝕜`. -/ universe u v v' wE wE₁ wE' wG wG' section continuous_eval variable {𝕜 ι : Type} {E : ι → Type} {F : Type} [NormedField 𝕜] [Finite ι] [∀ i, SeminormedAddCommGroup (E i)] [∀ i, NormedSpace 𝕜 (E i)] [TopologicalSpace F] [AddCommGroup F] [IsTopologicalAddGroup F] [Module 𝕜 F] instance ContinuousMultilinearMap.instContinuousEval : ContinuousEval (ContinuousMultilinearMap 𝕜 E F) (Π i, E i) F where continuous_eval := by cases nonempty_fintype ι let _ := IsTopologicalAddGroup.toUniformSpace F have := isUniformAddGroup_of_addCommGroup (G := F) refine (UniformOnFun.continuousOn_eval₂ fun m ↦ ?_).comp_continuous (isEmbedding_toUniformOnFun.continuous.prodMap continuous_id) fun (f, x) ↦ f.cont.continuousAt exact ⟨ball m 1, NormedSpace.isVonNBounded_of_isBounded _ isBounded_ball, ball_mem_nhds _ one_pos⟩ namespace ContinuousLinearMap variable {G : Type} [AddCommGroup G] [TopologicalSpace G] [Module 𝕜 G] [ContinuousConstSMul 𝕜 F] lemma continuous_uncurry_of_multilinear (f : G →L[𝕜] ContinuousMultilinearMap 𝕜 E F) : Continuous (fun (p : G × (Π i, E i)) ↦ f p.1 p.2) := by fun_prop lemma continuousOn_uncurry_of_multilinear (f : G →L[𝕜] ContinuousMultilinearMap 𝕜 E F) {s} : ContinuousOn (fun (p : G × (Π i, E i)) ↦ f p.1 p.2) s := f.continuous_uncurry_of_multilinear.continuousOn lemma continuousAt_uncurry_of_multilinear (f : G →L[𝕜] ContinuousMultilinearMap 𝕜 E F) {x} : ContinuousAt (fun (p : G × (Π i, E i)) ↦ f p.1 p.2) x := f.continuous_uncurry_of_multilinear.continuousAt lemma continuousWithinAt_uncurry_of_multilinear (f : G →L[𝕜] ContinuousMultilinearMap 𝕜 E F) {s x} : ContinuousWithinAt (fun (p : G × (Π i, E i)) ↦ f p.1 p.2) s x := f.continuous_uncurry_of_multilinear.continuousWithinAt end ContinuousLinearMap end continuous_eval section Seminorm variable {𝕜 : Type u} {ι : Type v} {ι' : Type v'} {E : ι → Type wE} {E₁ : ι → Type wE₁} {E' : ι' → Type wE'} {G : Type wG} {G' : Type wG'} [Fintype ι'] [NontriviallyNormedField 𝕜] [∀ i, SeminormedAddCommGroup (E i)] [∀ i, NormedSpace 𝕜 (E i)] [∀ i, SeminormedAddCommGroup (E₁ i)] [∀ i, NormedSpace 𝕜 (E₁ i)] [SeminormedAddCommGroup G] [NormedSpace 𝕜 G] [SeminormedAddCommGroup G'] [NormedSpace 𝕜 G'] /-! ### Continuity properties of multilinear maps We relate continuity of multilinear maps to the inequality `‖f m‖ ≤ C * ∏ i, ‖m i‖`, in both directions. Along the way, we prove useful bounds on the difference `‖f m₁ - f m₂‖`. -/ namespace MultilinearMap /-- If `f` is a continuous multilinear map on `E` and `m` is an element of `∀ i, E i` such that one of the `m i` has norm `0`, then `f m` has norm `0`. Note that we cannot drop the continuity assumption because `f (m : Unit → E) = f (m ())`, where the domain has zero norm and the codomain has a nonzero norm does not satisfy this condition. -/ lemma norm_map_coord_zero (f : MultilinearMap 𝕜 E G) (hf : Continuous f) {m : ∀ i, E i} {i : ι} (hi : ‖m i‖ = 0) : ‖f m‖ = 0 := by classical rw [← inseparable_zero_iff_norm] at hi ⊢ have : Inseparable (update m i 0) m := inseparable_pi.2 <\| (forall_update_iff m fun i a ↦ Inseparable a (m i)).2 ⟨hi.symm, fun _ _ ↦ rfl⟩ simpa only [map_update_zero] using this.symm.map hf variable [Fintype ι] /-- If a multilinear map in finitely many variables on seminormed spaces sends vectors with a component of norm zero to vectors of norm zero and satisfies the inequality `‖f m‖ ≤ C * ∏ i, ‖m i‖` on a shell `ε i / ‖c i‖ < ‖m i‖ < ε i` for some positive numbers `ε i` and elements `c i : 𝕜`, `1 < ‖c i‖`, then it satisfies this inequality for all `m`. The first assumption is automatically satisfied on normed spaces, see `bound_of_shell` below. For seminormed spaces, it follows from continuity of `f`, see next lemma, see `bound_of_shell_of_continuous` below. -/ theorem bound_of_shell_of_norm_map_coord_zero (f : MultilinearMap 𝕜 E G) (hf₀ : ∀ {m i}, ‖m i‖ = 0 → ‖f m‖ = 0) {ε : ι → ℝ} {C : ℝ} (hε : ∀ i, 0 < ε i) {c : ι → 𝕜} (hc : ∀ i, 1 < ‖c i‖) (hf : ∀ m : ∀ i, E i, (∀ i, ε i / ‖c i‖ ≤ ‖m i‖) → (∀ i, ‖m i‖ < ε i) → ‖f m‖ ≤ C * ∏ i, ‖m i‖) (m : ∀ i, E i) : ‖f m‖ ≤ C * ∏ i, ‖m i‖ := by rcases em (∃ i, ‖m i‖ = 0) with (⟨i, hi⟩ \| hm) · rw [hf₀ hi, prod_eq_zero (mem_univ i) hi, mul_zero] push_neg at hm choose δ hδ0 hδm_lt hle_δm _ using fun i => rescale_to_shell_semi_normed (hc i) (hε i) (hm i) have hδ0 : 0 < ∏ i, ‖δ i‖ := prod_pos fun i _ => norm_pos_iff.2 (hδ0 i) simpa [map_smul_univ, norm_smul, prod_mul_distrib, mul_left_comm C, mul_le_mul_left hδ0] using hf (fun i => δ i • m i) hle_δm hδm_lt /-- If a continuous multilinear map in finitely many variables on normed spaces satisfies the inequality `‖f m‖ ≤ C * ∏ i, ‖m i‖` on a shell `ε i / ‖c i‖ < ‖m i‖ < ε i` for some positive numbers `ε i` and elements `c i : 𝕜`, `1 < ‖c i‖`, then it satisfies this inequality for all `m`. -/ theorem bound_of_shell_of_continuous (f : MultilinearMap 𝕜 E G) (hfc : Continuous f) {ε : ι → ℝ} {C : ℝ} (hε : ∀ i, 0 < ε i) {c : ι → 𝕜} (hc : ∀ i, 1 < ‖c i‖) (hf : ∀ m : ∀ i, E i, (∀ i, ε i / ‖c i‖ ≤ ‖m i‖) → (∀ i, ‖m i‖ < ε i) → ‖f m‖ ≤ C * ∏ i, ‖m i‖) (m : ∀ i, E i) : ‖f m‖ ≤ C * ∏ i, ‖m i‖ := bound_of_shell_of_norm_map_coord_zero f (norm_map_coord_zero f hfc) hε hc hf m /-- If a multilinear map in finitely many variables on normed spaces is continuous, then it satisfies the inequality `‖f m‖ ≤ C * ∏ i, ‖m i‖`, for some `C` which can be chosen to be positive. -/ theorem exists_bound_of_continuous (f : MultilinearMap 𝕜 E G) (hf : Continuous f) : ∃ C : ℝ, 0 < C ∧ ∀ m, ‖f m‖ ≤ C * ∏ i, ‖m i‖ := by cases isEmpty_or_nonempty ι · refine ⟨‖f 0‖ + 1, add_pos_of_nonneg_of_pos (norm_nonneg _) zero_lt_one, fun m => ?_⟩ obtain rfl : m = 0 := funext (IsEmpty.elim ‹_›) simp [univ_eq_empty, zero_le_one] obtain ⟨ε : ℝ, ε0 : 0 < ε, hε : ∀ m : ∀ i, E i, ‖m - 0‖ < ε → ‖f m - f 0‖ < 1⟩ := NormedAddCommGroup.tendsto_nhds_nhds.1 (hf.tendsto 0) 1 zero_lt_one simp only [sub_zero, f.map_zero] at hε rcases NormedField.exists_one_lt_norm 𝕜 with ⟨c, hc⟩ have : 0 < (‖c‖ / ε) ^ Fintype.card ι := pow_pos (div_pos (zero_lt_one.trans hc) ε0) _ refine ⟨_, this, ?_⟩ refine f.bound_of_shell_of_continuous hf (fun _ => ε0) (fun _ => hc) fun m hcm hm => ?_ refine (hε m ((pi_norm_lt_iff ε0).2 hm)).le.trans ?_ rw [← div_le_iff₀' this, one_div, ← inv_pow, inv_div, Fintype.card, ← prod_const] exact prod_le_prod (fun _ _ => div_nonneg ε0.le (norm_nonneg _)) fun i _ => hcm i /-- If a multilinear map `f` satisfies a boundedness property around `0`, one can deduce a bound on `f m₁ - f m₂` using the multilinearity. Here, we give a precise but hard to use version. See `norm_image_sub_le_of_bound` for a less precise but more usable version. The bound reads `‖f m - f m'‖ ≤ C * ‖m 1 - m' 1‖ * max ‖m 2‖ ‖m' 2‖ * max ‖m 3‖ ‖m' 3‖ * ... * max ‖m n‖ ‖m' n‖ + ...`, where the other terms in the sum are the same products where `1` is replaced by any `i`. -/ theorem norm_image_sub_le_of_bound' [DecidableEq ι] (f : MultilinearMap 𝕜 E G) {C : ℝ} (hC : 0 ≤ C) (H : ∀ m, ‖f m‖ ≤ C * ∏ i, ‖m i‖) (m₁ m₂ : ∀ i, E i) : ‖f m₁ - f m₂‖ ≤ C * ∑ i, ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖ := by have A : ∀ s : Finset ι, ‖f m₁ - f (s.piecewise m₂ m₁)‖ ≤ C * ∑ i ∈ s, ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖ := by intro s induction' s using Finset.induction with i s his Hrec · simp have I : ‖f (s.piecewise m₂ m₁) - f ((insert i s).piecewise m₂ m₁)‖ ≤ C * ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖ := by have A : (insert i s).piecewise m₂ m₁ = Function.update (s.piecewise m₂ m₁) i (m₂ i) := s.piecewise_insert _ _ _ have B : s.piecewise m₂ m₁ = Function.update (s.piecewise m₂ m₁) i (m₁ i) := by simp [eq_update_iff, his] rw [B, A, ← f.map_update_sub] apply le_trans (H _) gcongr with j by_cases h : j = i · rw [h] simp · by_cases h' : j ∈ s <;> simp [h', h, le_refl] calc ‖f m₁ - f ((insert i s).piecewise m₂ m₁)‖ ≤ ‖f m₁ - f (s.piecewise m₂ m₁)‖ + ‖f (s.piecewise m₂ m₁) - f ((insert i s).piecewise m₂ m₁)‖ := by rw [← dist_eq_norm, ← dist_eq_norm, ← dist_eq_norm] exact dist_triangle _ _ _ _ ≤ (C * ∑ i ∈ s, ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖) + C * ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖ := (add_le_add Hrec I) _ = C * ∑ i ∈ insert i s, ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖ := by simp [his, add_comm, left_distrib] convert A univ simp /-- If `f` satisfies a boundedness property around `0`, one can deduce a bound on `f m₁ - f m₂` using the multilinearity. Here, we give a usable but not very precise version. See `norm_image_sub_le_of_bound'` for a more precise but less usable version. The bound is `‖f m - f m'‖ ≤ C * card ι * ‖m - m'‖ * (max ‖m‖ ‖m'‖) ^ (card ι - 1)`. -/ theorem norm_image_sub_le_of_bound (f : MultilinearMap 𝕜 E G) {C : ℝ} (hC : 0 ≤ C) (H : ∀ m, ‖f m‖ ≤ C * ∏ i, ‖m i‖) (m₁ m₂ : ∀ i, E i) : ‖f m₁ - f m₂‖ ≤ C * Fintype.card ι * max ‖m₁‖ ‖m₂‖ ^ (Fintype.card ι - 1) * ‖m₁ - m₂‖ := by classical have A : ∀ i : ι, ∏ j, (if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖) ≤ ‖m₁ - m₂‖ * max ‖m₁‖ ‖m₂‖ ^ (Fintype.card ι - 1) := by intro i calc ∏ j, (if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖) ≤ ∏ j : ι, Function.update (fun _ => max ‖m₁‖ ‖m₂‖) i ‖m₁ - m₂‖ j := by apply Finset.prod_le_prod · intro j _ by_cases h : j = i <;> simp [h, norm_nonneg] · intro j _ by_cases h : j = i · rw [h] simp only [ite_true, Function.update_self] exact norm_le_pi_norm (m₁ - m₂) i · simp [h, - le_sup_iff, - sup_le_iff, sup_le_sup, norm_le_pi_norm] _ = ‖m₁ - m₂‖ * max ‖m₁‖ ‖m₂‖ ^ (Fintype.card ι - 1) := by rw [prod_update_of_mem (Finset.mem_univ _)] simp [card_univ_diff] calc ‖f m₁ - f m₂‖ ≤ C * ∑ i, ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖ := f.norm_image_sub_le_of_bound' hC H m₁ m₂ _ ≤ C * ∑ _i, ‖m₁ - m₂‖ * max ‖m₁‖ ‖m₂‖ ^ (Fintype.card ι - 1) := by gcongr; apply A _ = C * Fintype.card ι * max ‖m₁‖ ‖m₂‖ ^ (Fintype.card ι - 1) * ‖m₁ - m₂‖ := by rw [sum_const, card_univ, nsmul_eq_mul] ring /-- If a multilinear map satisfies an inequality `‖f m‖ ≤ C * ∏ i, ‖m i‖`, then it is continuous. -/ theorem continuous_of_bound (f : MultilinearMap 𝕜 E G) (C : ℝ) (H : ∀ m, ‖f m‖ ≤ C * ∏ i, ‖m i‖) : Continuous f := by let D := max C 1 have D_pos : 0 ≤ D := le_trans zero_le_one (le_max_right _ _) replace H (m) : ‖f m‖ ≤ D * ∏ i, ‖m i‖ := (H m).trans (mul_le_mul_of_nonneg_right (le_max_left _ _) <\| by positivity) refine continuous_iff_continuousAt.2 fun m => ?_ refine continuousAt_of_locally_lipschitz zero_lt_one (D * Fintype.card ι * (‖m‖ + 1) ^ (Fintype.card ι - 1)) fun m' h' => ?_ rw [dist_eq_norm, dist_eq_norm] have : max ‖m'‖ ‖m‖ ≤ ‖m‖ + 1 := by simp [zero_le_one, norm_le_of_mem_closedBall (le_of_lt h')] calc ‖f m' - f m‖ ≤ D * Fintype.card ι * max ‖m'‖ ‖m‖ ^ (Fintype.card ι - 1) * ‖m' - m‖ := f.norm_image_sub_le_of_bound D_pos H m' m _ ≤ D * Fintype.card ι * (‖m‖ + 1) ^ (Fintype.card ι - 1) * ‖m' - m‖ := by gcongr /-- Constructing a continuous multilinear map from a multilinear map satisfying a boundedness condition. -/ def mkContinuous (f : MultilinearMap 𝕜 E G) (C : ℝ) (H : ∀ m, ‖f m‖ ≤ C * ∏ i, ‖m i‖) : ContinuousMultilinearMap 𝕜 E G := { f with cont := f.continuous_of_bound C H } @[simp] theorem coe_mkContinuous (f : MultilinearMap 𝕜 E G) (C : ℝ) (H : ∀ m, ‖f m‖ ≤ C * ∏ i, ‖m i‖) : ⇑(f.mkContinuous C H) = f := rfl /-- Given a multilinear map in `n` variables, if one restricts it to `k` variables putting `z` on the other coordinates, then the resulting restricted function satisfies an inequality `‖f.restr v‖ ≤ C * ‖z‖^(n-k) * Π ‖v i‖` if the original function satisfies `‖f v‖ ≤ C * Π ‖v i‖`. -/ theorem restr_norm_le {k n : ℕ} (f : MultilinearMap 𝕜 (fun _ : Fin n => G) G') (s : Finset (Fin n)) (hk : #s = k) (z : G) {C : ℝ} (H : ∀ m, ‖f m‖ ≤ C * ∏ i, ‖m i‖) (v : Fin k → G) : ‖f.restr s hk z v‖ ≤ C * ‖z‖ ^ (n - k) * ∏ i, ‖v i‖ := by rw [mul_right_comm, mul_assoc] convert H _ using 2 simp only [apply_dite norm, Fintype.prod_dite, prod_const ‖z‖, Finset.card_univ, Fintype.card_of_subtype sᶜ fun _ => mem_compl, card_compl, Fintype.card_fin, hk, mk_coe, ← (s.orderIsoOfFin hk).symm.bijective.prod_comp fun x => ‖v x‖] convert rfl end MultilinearMap /-! ### Continuous multilinear maps We define the norm `‖f‖` of a continuous multilinear map `f` in finitely many variables as the smallest number such that `‖f m‖ ≤ ‖f‖ * ∏ i, ‖m i‖` for all `m`. We show that this defines a normed space structure on `ContinuousMultilinearMap 𝕜 E G`. -/ namespace ContinuousMultilinearMap variable [Fintype ι] theorem bound (f : ContinuousMultilinearMap 𝕜 E G) : ∃ C : ℝ, 0 < C ∧ ∀ m, ‖f m‖ ≤ C * ∏ i, ‖m i‖ := f.toMultilinearMap.exists_bound_of_continuous f.2 open Real /-- The operator norm of a continuous multilinear map is the inf of all its bounds. -/ def opNorm (f : ContinuousMultilinearMap 𝕜 E G) : ℝ := sInf { c \| 0 ≤ (c : ℝ) ∧ ∀ m, ‖f m‖ ≤ c * ∏ i, ‖m i‖ } instance hasOpNorm : Norm (ContinuousMultilinearMap 𝕜 E G) := ⟨opNorm⟩ /-- An alias of `ContinuousMultilinearMap.hasOpNorm` with non-dependent types to help typeclass search. -/ instance hasOpNorm' : Norm (ContinuousMultilinearMap 𝕜 (fun _ : ι => G) G') := ContinuousMultilinearMap.hasOpNorm theorem norm_def (f : ContinuousMultilinearMap 𝕜 E G) : ‖f‖ = sInf { c \| 0 ≤ (c : ℝ) ∧ ∀ m, ‖f m‖ ≤ c * ∏ i, ‖m i‖ } := rfl -- So that invocations of `le_csInf` make sense: we show that the set of -- bounds is nonempty and bounded below. theorem bounds_nonempty {f : ContinuousMultilinearMap 𝕜 E G} : ∃ c, c ∈ { c \| 0 ≤ c ∧ ∀ m, ‖f m‖ ≤ c * ∏ i, ‖m i‖ } := let ⟨M, hMp, hMb⟩ := f.bound ⟨M, le_of_lt hMp, hMb⟩ theorem bounds_bddBelow {f : ContinuousMultilinearMap 𝕜 E G} : BddBelow { c \| 0 ≤ c ∧ ∀ m, ‖f m‖ ≤ c * ∏ i, ‖m i‖ } := ⟨0, fun _ ⟨hn, _⟩ => hn⟩ theorem isLeast_opNorm (f : ContinuousMultilinearMap 𝕜 E G) : IsLeast {c : ℝ \| 0 ≤ c ∧ ∀ m, ‖f m‖ ≤ c * ∏ i, ‖m i‖} ‖f‖ := by refine IsClosed.isLeast_csInf ?_ bounds_nonempty bounds_bddBelow simp only [Set.setOf_and, Set.setOf_forall] exact isClosed_Ici.inter (isClosed_iInter fun m ↦ isClosed_le continuous_const (continuous_id.mul continuous_const)) theorem opNorm_nonneg (f : ContinuousMultilinearMap 𝕜 E G) : 0 ≤ ‖f‖ := Real.sInf_nonneg fun _ ⟨hx, _⟩ => hx /-- The fundamental property of the operator norm of a continuous multilinear map: `‖f m‖` is bounded by `‖f‖` times the product of the `‖m i‖`. -/ theorem le_opNorm (f : ContinuousMultilinearMap 𝕜 E G) (m : ∀ i, E i) : ‖f m‖ ≤ ‖f‖ * ∏ i, ‖m i‖ := f.isLeast_opNorm.1.2 m theorem le_mul_prod_of_opNorm_le_of_le {f : ContinuousMultilinearMap 𝕜 E G} {m : ∀ i, E i} {C : ℝ} {b : ι → ℝ} (hC : ‖f‖ ≤ C) (hm : ∀ i, ‖m i‖ ≤ b i) : ‖f m‖ ≤ C * ∏ i, b i := (f.le_opNorm m).trans <\| by gcongr; exacts [f.opNorm_nonneg.trans hC, hm _] @[deprecated (since := "2024-11-27")] alias le_mul_prod_of_le_opNorm_of_le := le_mul_prod_of_opNorm_le_of_le theorem le_opNorm_mul_prod_of_le (f : ContinuousMultilinearMap 𝕜 E G) {m : ∀ i, E i} {b : ι → ℝ} (hm : ∀ i, ‖m i‖ ≤ b i) : ‖f m‖ ≤ ‖f‖ * ∏ i, b i := le_mul_prod_of_opNorm_le_of_le le_rfl hm theorem le_opNorm_mul_pow_card_of_le (f : ContinuousMultilinearMap 𝕜 E G) {m b} (hm : ‖m‖ ≤ b) : ‖f m‖ ≤ ‖f‖ * b ^ Fintype.card ι := by simpa only [prod_const] using f.le_opNorm_mul_prod_of_le fun i => (norm_le_pi_norm m i).trans hm theorem le_opNorm_mul_pow_of_le {n : ℕ} {Ei : Fin n → Type} [∀ i, SeminormedAddCommGroup (Ei i)] [∀ i, NormedSpace 𝕜 (Ei i)] (f : ContinuousMultilinearMap 𝕜 Ei G) {m : ∀ i, Ei i} {b : ℝ} (hm : ‖m‖ ≤ b) : ‖f m‖ ≤ ‖f‖ b ^ n := by simpa only [Fintype.card_fin] using f.le_opNorm_mul_pow_card_of_le hm theorem le_of_opNorm_le {f : ContinuousMultilinearMap 𝕜 E G} {C : ℝ} (h : ‖f‖ ≤ C) (m : ∀ i, E i) : ‖f m‖ ≤ C * ∏ i, ‖m i‖ := le_mul_prod_of_opNorm_le_of_le h fun _ ↦ le_rfl theorem ratio_le_opNorm (f : ContinuousMultilinearMap 𝕜 E G) (m : ∀ i, E i) : (‖f m‖ / ∏ i, ‖m i‖) ≤ ‖f‖ := div_le_of_le_mul₀ (by positivity) (opNorm_nonneg _) (f.le_opNorm m) /-- The image of the unit ball under a continuous multilinear map is bounded. -/ theorem unit_le_opNorm (f : ContinuousMultilinearMap 𝕜 E G) {m : ∀ i, E i} (h : ‖m‖ ≤ 1) : ‖f m‖ ≤ ‖f‖ := (le_opNorm_mul_pow_card_of_le f h).trans <\| by simp /-- If one controls the norm of every `f x`, then one controls the norm of `f`. -/ theorem opNorm_le_bound {f : ContinuousMultilinearMap 𝕜 E G} {M : ℝ} (hMp : 0 ≤ M) (hM : ∀ m, ‖f m‖ ≤ M * ∏ i, ‖m i‖) : ‖f‖ ≤ M := csInf_le bounds_bddBelow ⟨hMp, hM⟩ theorem opNorm_le_iff {f : ContinuousMultilinearMap 𝕜 E G} {C : ℝ} (hC : 0 ≤ C) : ‖f‖ ≤ C ↔ ∀ m, ‖f m‖ ≤ C * ∏ i, ‖m i‖ := ⟨fun h _ ↦ le_of_opNorm_le h _, opNorm_le_bound hC⟩ /-- The operator norm satisfies the triangle inequality. -/ theorem opNorm_add_le (f g : ContinuousMultilinearMap 𝕜 E G) : ‖f + g‖ ≤ ‖f‖ + ‖g‖ := opNorm_le_bound (add_nonneg (opNorm_nonneg f) (opNorm_nonneg g)) fun x => by rw [add_mul] exact norm_add_le_of_le (le_opNorm _ _) (le_opNorm _ _) theorem opNorm_zero : ‖(0 : ContinuousMultilinearMap 𝕜 E G)‖ = 0 := (opNorm_nonneg _).antisymm' <\| opNorm_le_bound le_rfl fun m => by simp section variable {𝕜' : Type} [NormedField 𝕜'] [NormedSpace 𝕜' G] [SMulCommClass 𝕜 𝕜' G] theorem opNorm_smul_le (c : 𝕜') (f : ContinuousMultilinearMap 𝕜 E G) : ‖c • f‖ ≤ ‖c‖ ‖f‖ := (c • f).opNorm_le_bound (mul_nonneg (norm_nonneg _) (opNorm_nonneg _)) fun m ↦ by rw [smul_apply, norm_smul, mul_assoc] exact mul_le_mul_of_nonneg_left (le_opNorm _ _) (norm_nonneg _) variable (𝕜 E G) in /-- Operator seminorm on the space of continuous multilinear maps, as `Seminorm`. We use this seminorm to define a `SeminormedAddCommGroup` structure on `ContinuousMultilinearMap 𝕜 E G`, but we have to override the projection `UniformSpace` so that it is definitionally equal to the one coming from the topologies on `E` and `G`. -/ protected def seminorm : Seminorm 𝕜 (ContinuousMultilinearMap 𝕜 E G) := .ofSMulLE norm opNorm_zero opNorm_add_le fun c f ↦ f.opNorm_smul_le c private lemma uniformity_eq_seminorm : 𝓤 (ContinuousMultilinearMap 𝕜 E G) = ⨅ r > 0, 𝓟 {f \| ‖f.1 - f.2‖ < r} := by refine (ContinuousMultilinearMap.seminorm 𝕜 E G).uniformity_eq_of_hasBasis (ContinuousMultilinearMap.hasBasis_nhds_zero_of_basis Metric.nhds_basis_closedBall) ?_ fun (s, r) ⟨hs, hr⟩ ↦ ?_ · rcases NormedField.exists_lt_norm 𝕜 1 with ⟨c, hc⟩ have hc₀ : 0 < ‖c‖ := one_pos.trans hc simp only [hasBasis_nhds_zero.mem_iff, Prod.exists] use 1, closedBall 0 ‖c‖, closedBall 0 1 suffices ∀ f : ContinuousMultilinearMap 𝕜 E G, (∀ x, ‖x‖ ≤ ‖c‖ → ‖f x‖ ≤ 1) → ‖f‖ ≤ 1 by simpa [NormedSpace.isVonNBounded_closedBall, closedBall_mem_nhds, Set.subset_def, Set.MapsTo] intro f hf refine opNorm_le_bound (by positivity) <\| f.1.bound_of_shell_of_continuous f.2 (fun _ ↦ hc₀) (fun _ ↦ hc) fun x hcx hx ↦ ?_ calc ‖f x‖ ≤ 1 := hf _ <\| (pi_norm_le_iff_of_nonneg (norm_nonneg c)).2 fun i ↦ (hx i).le _ = ∏ i : ι, 1 := by simp _ ≤ ∏ i, ‖x i‖ := Finset.prod_le_prod (fun _ _ ↦ zero_le_one) fun i _ ↦ by simpa only [div_self hc₀.ne'] using hcx i _ = 1 * ∏ i, ‖x i‖ := (one_mul _).symm · rcases (NormedSpace.isVonNBounded_iff' _).1 hs with ⟨ε, hε⟩ rcases exists_pos_mul_lt hr (ε ^ Fintype.card ι) with ⟨δ, hδ₀, hδ⟩ refine ⟨δ, hδ₀, fun f hf x hx ↦ ?_⟩ simp only [Seminorm.mem_ball_zero, mem_closedBall_zero_iff] at hf ⊢ replace hf : ‖f‖ ≤ δ := hf.le replace hx : ‖x‖ ≤ ε := hε x hx calc ‖f x‖ ≤ ‖f‖ * ε ^ Fintype.card ι := le_opNorm_mul_pow_card_of_le f hx _ ≤ δ * ε ^ Fintype.card ι := by have := (norm_nonneg x).trans hx; gcongr _ ≤ r := (mul_comm _ _).trans_le hδ.le instance instPseudoMetricSpace : PseudoMetricSpace (ContinuousMultilinearMap 𝕜 E G) := .replaceUniformity (ContinuousMultilinearMap.seminorm 𝕜 E G).toSeminormedAddCommGroup.toPseudoMetricSpace uniformity_eq_seminorm /-- Continuous multilinear maps themselves form a seminormed space with respect to the operator norm. -/ instance seminormedAddCommGroup : SeminormedAddCommGroup (ContinuousMultilinearMap 𝕜 E G) := ⟨fun _ _ ↦ rfl⟩ /-- An alias of `ContinuousMultilinearMap.seminormedAddCommGroup` with non-dependent types to help typeclass search. -/ instance seminormedAddCommGroup' : SeminormedAddCommGroup (ContinuousMultilinearMap 𝕜 (fun _ : ι => G) G') := ContinuousMultilinearMap.seminormedAddCommGroup instance normedSpace : NormedSpace 𝕜' (ContinuousMultilinearMap 𝕜 E G) := ⟨fun c f => f.opNorm_smul_le c⟩ /-- An alias of `ContinuousMultilinearMap.normedSpace` with non-dependent types to help typeclass search. -/ instance normedSpace' : NormedSpace 𝕜' (ContinuousMultilinearMap 𝕜 (fun _ : ι => G') G) := ContinuousMultilinearMap.normedSpace @[deprecated norm_neg (since := "2024-11-24")] theorem opNorm_neg (f : ContinuousMultilinearMap 𝕜 E G) : ‖-f‖ = ‖f‖ := norm_neg f /-- The fundamental property of the operator norm of a continuous multilinear map: `‖f m‖` is bounded by `‖f‖` times the product of the `‖m i‖`, `nnnorm` version. -/ theorem le_opNNNorm (f : ContinuousMultilinearMap 𝕜 E G) (m : ∀ i, E i) : ‖f m‖₊ ≤ ‖f‖₊ * ∏ i, ‖m i‖₊ := NNReal.coe_le_coe.1 <\| by push_cast exact f.le_opNorm m theorem le_of_opNNNorm_le (f : ContinuousMultilinearMap 𝕜 E G) {C : ℝ≥0} (h : ‖f‖₊ ≤ C) (m : ∀ i, E i) : ‖f m‖₊ ≤ C * ∏ i, ‖m i‖₊ := (f.le_opNNNorm m).trans <\| mul_le_mul' h le_rfl theorem opNNNorm_le_iff {f : ContinuousMultilinearMap 𝕜 E G} {C : ℝ≥0} : ‖f‖₊ ≤ C ↔ ∀ m, ‖f m‖₊ ≤ C * ∏ i, ‖m i‖₊ := by simp only [← NNReal.coe_le_coe]; simp [opNorm_le_iff C.coe_nonneg, NNReal.coe_prod] theorem isLeast_opNNNorm (f : ContinuousMultilinearMap 𝕜 E G) : IsLeast {C : ℝ≥0 \| ∀ m, ‖f m‖₊ ≤ C * ∏ i, ‖m i‖₊} ‖f‖₊ := by simpa only [← opNNNorm_le_iff] using isLeast_Ici theorem opNNNorm_prod (f : ContinuousMultilinearMap 𝕜 E G) (g : ContinuousMultilinearMap 𝕜 E G') : ‖f.prod g‖₊ = max ‖f‖₊ ‖g‖₊ := eq_of_forall_ge_iff fun _ ↦ by simp only [opNNNorm_le_iff, prod_apply, Prod.nnnorm_def, max_le_iff, forall_and] theorem opNorm_prod (f : ContinuousMultilinearMap 𝕜 E G) (g : ContinuousMultilinearMap 𝕜 E G') : ‖f.prod g‖ = max ‖f‖ ‖g‖ := congr_arg NNReal.toReal (opNNNorm_prod f g) theorem opNNNorm_pi [∀ i', SeminormedAddCommGroup (E' i')] [∀ i', NormedSpace 𝕜 (E' i')] (f : ∀ i', ContinuousMultilinearMap 𝕜 E (E' i')) : ‖pi f‖₊ = ‖f‖₊ := eq_of_forall_ge_iff fun _ ↦ by simpa [opNNNorm_le_iff, pi_nnnorm_le_iff] using forall_swap theorem opNorm_pi {ι' : Type v'} [Fintype ι'] {E' : ι' → Type wE'} [∀ i', SeminormedAddCommGroup (E' i')] [∀ i', NormedSpace 𝕜 (E' i')] (f : ∀ i', ContinuousMultilinearMap 𝕜 E (E' i')) : ‖pi f‖ = ‖f‖ := congr_arg NNReal.toReal (opNNNorm_pi f) section @[simp] theorem norm_ofSubsingleton [Subsingleton ι] (i : ι) (f : G →L[𝕜] G') : ‖ofSubsingleton 𝕜 G G' i f‖ = ‖f‖ := by letI : Unique ι := uniqueOfSubsingleton i simp [norm_def, ContinuousLinearMap.norm_def, (Equiv.funUnique _ _).symm.surjective.forall] @[simp] theorem nnnorm_ofSubsingleton [Subsingleton ι] (i : ι) (f : G →L[𝕜] G') : ‖ofSubsingleton 𝕜 G G' i f‖₊ = ‖f‖₊ := NNReal.eq <\| norm_ofSubsingleton i f variable (𝕜 G) /-- Linear isometry between continuous linear maps from `G` to `G'` and continuous `1`-multilinear maps from `G` to `G'`. -/ @[simps apply symm_apply] def ofSubsingletonₗᵢ [Subsingleton ι] (i : ι) : (G →L[𝕜] G') ≃ₗᵢ[𝕜] ContinuousMultilinearMap 𝕜 (fun _ : ι ↦ G) G' := { ofSubsingleton 𝕜 G G' i with map_add' := fun _ _ ↦ rfl map_smul' := fun _ _ ↦ rfl norm_map' := norm_ofSubsingleton i } theorem norm_ofSubsingleton_id_le [Subsingleton ι] (i : ι) : ‖ofSubsingleton 𝕜 G G i (.id _ _)‖ ≤ 1 := by rw [norm_ofSubsingleton] apply ContinuousLinearMap.norm_id_le theorem nnnorm_ofSubsingleton_id_le [Subsingleton ι] (i : ι) : ‖ofSubsingleton 𝕜 G G i (.id _ _)‖₊ ≤ 1 := norm_ofSubsingleton_id_le _ _ _ variable {G} (E) @[simp] theorem norm_constOfIsEmpty [IsEmpty ι] (x : G) : ‖constOfIsEmpty 𝕜 E x‖ = ‖x‖ := by apply le_antisymm · refine opNorm_le_bound (norm_nonneg _) fun x => ?_ rw [Fintype.prod_empty, mul_one, constOfIsEmpty_apply] · simpa using (constOfIsEmpty 𝕜 E x).le_opNorm 0 @[simp] theorem nnnorm_constOfIsEmpty [IsEmpty ι] (x : G) : ‖constOfIsEmpty 𝕜 E x‖₊ = ‖x‖₊ := NNReal.eq <\| norm_constOfIsEmpty _ _ _ end section variable (𝕜 E E' G G') /-- `ContinuousMultilinearMap.prod` as a `LinearIsometryEquiv`. -/ @[simps] def prodL : ContinuousMultilinearMap 𝕜 E G × ContinuousMultilinearMap 𝕜 E G' ≃ₗᵢ[𝕜] ContinuousMultilinearMap 𝕜 E (G × G') where __ := prodEquiv map_add' _ _ := rfl map_smul' _ _ := rfl norm_map' f := opNorm_prod f.1 f.2 /-- `ContinuousMultilinearMap.pi` as a `LinearIsometryEquiv`. -/ @[simps! apply symm_apply] def piₗᵢ {ι' : Type v'} [Fintype ι'] {E' : ι' → Type wE'} [∀ i', NormedAddCommGroup (E' i')] [∀ i', NormedSpace 𝕜 (E' i')] : (Π i', ContinuousMultilinearMap 𝕜 E (E' i')) ≃ₗᵢ[𝕜] (ContinuousMultilinearMap 𝕜 E (Π i, E' i)) where toLinearEquiv := piLinearEquiv norm_map' := opNorm_pi end end section RestrictScalars variable {𝕜' : Type} [NontriviallyNormedField 𝕜'] [NormedAlgebra 𝕜' 𝕜] variable [NormedSpace 𝕜' G] [IsScalarTower 𝕜' 𝕜 G] variable [∀ i, NormedSpace 𝕜' (E i)] [∀ i, IsScalarTower 𝕜' 𝕜 (E i)] @[simp] theorem norm_restrictScalars (f : ContinuousMultilinearMap 𝕜 E G) : ‖f.restrictScalars 𝕜'‖ = ‖f‖ := rfl variable (𝕜') /-- `ContinuousMultilinearMap.restrictScalars` as a `LinearIsometry`. -/ def restrictScalarsₗᵢ : ContinuousMultilinearMap 𝕜 E G →ₗᵢ[𝕜'] ContinuousMultilinearMap 𝕜' E G where toFun := restrictScalars 𝕜' map_add' _ _ := rfl map_smul' _ _ := rfl norm_map' _ := rfl end RestrictScalars /-- The difference `f m₁ - f m₂` is controlled in terms of `‖f‖` and `‖m₁ - m₂‖`, precise version. For a less precise but more usable version, see `norm_image_sub_le`. The bound reads `‖f m - f m'‖ ≤ ‖f‖ ‖m 1 - m' 1‖ * max ‖m 2‖ ‖m' 2‖ * max ‖m 3‖ ‖m' 3‖ * ... * max ‖m n‖ ‖m' n‖ + ...`, where the other terms in the sum are the same products where `1` is replaced by any `i`. -/ theorem norm_image_sub_le' [DecidableEq ι] (f : ContinuousMultilinearMap 𝕜 E G) (m₁ m₂ : ∀ i, E i) : ‖f m₁ - f m₂‖ ≤ ‖f‖ * ∑ i, ∏ j, if j = i then ‖m₁ i - m₂ i‖ else max ‖m₁ j‖ ‖m₂ j‖ := f.toMultilinearMap.norm_image_sub_le_of_bound' (norm_nonneg _) f.le_opNorm _ _ /-- The difference `f m₁ - f m₂` is controlled in terms of `‖f‖` and `‖m₁ - m₂‖`, less precise version. For a more precise but less usable version, see `norm_image_sub_le'`. The bound is `‖f m - f m'‖ ≤ ‖f‖ * card ι * ‖m - m'‖ * (max ‖m‖ ‖m'‖) ^ (card ι - 1)`. -/ theorem norm_image_sub_le (f : ContinuousMultilinearMap 𝕜 E G) (m₁ m₂ : ∀ i, E i) : ‖f m₁ - f m₂‖ ≤ ‖f‖ * Fintype.card ι * max ‖m₁‖ ‖m₂‖ ^ (Fintype.card ι - 1) * ‖m₁ - m₂‖ := f.toMultilinearMap.norm_image_sub_le_of_bound (norm_nonneg _) f.le_opNorm _ _ end ContinuousMultilinearMap variable [Fintype ι] /-- If a continuous multilinear map is constructed from a multilinear map via the constructor `mkContinuous`, then its norm is bounded by the bound given to the constructor if it is nonnegative. -/ theorem MultilinearMap.mkContinuous_norm_le (f : MultilinearMap 𝕜 E G) {C : ℝ} (hC : 0 ≤ C) (H : ∀ m, ‖f m‖ ≤ C * ∏ i, ‖m i‖) : ‖f.mkContinuous C H‖ ≤ C := ContinuousMultilinearMap.opNorm_le_bound hC fun m => H m /-- If a continuous multilinear map is constructed from a multilinear map via the constructor `mkContinuous`, then its norm is bounded by the bound given to the constructor if it is nonnegative. -/ theorem MultilinearMap.mkContinuous_norm_le' (f : MultilinearMap 𝕜 E G) {C : ℝ} (H : ∀ m, ‖f m‖ ≤ C * ∏ i, ‖m i‖) : ‖f.mkContinuous C H‖ ≤ max C 0 := ContinuousMultilinearMap.opNorm_le_bound (le_max_right _ _) fun m ↦ (H m).trans <\| mul_le_mul_of_nonneg_right (le_max_left _ _) <\| by positivity namespace ContinuousMultilinearMap /-- Given a continuous multilinear map `f` on `n` variables (parameterized by `Fin n`) and a subset `s` of `k` of these variables, one gets a new continuous multilinear map on `Fin k` by varying these variables, and fixing the other ones equal to a given value `z`. It is denoted by `f.restr s hk z`, where `hk` is a proof that the cardinality of `s` is `k`. The implicit identification between `Fin k` and `s` that we use is the canonical (increasing) bijection. -/ def restr {k n : ℕ} (f : (G [×n]→L[𝕜] G' :)) (s : Finset (Fin n)) (hk : #s = k) (z : G) : G [×k]→L[𝕜] G' := (f.toMultilinearMap.restr s hk z).mkContinuous (‖f‖ * ‖z‖ ^ (n - k)) fun _ => MultilinearMap.restr_norm_le _ _ _ _ f.le_opNorm _ theorem norm_restr {k n : ℕ} (f : G [×n]→L[𝕜] G') (s : Finset (Fin n)) (hk : #s = k) (z : G) : ‖f.restr s hk z‖ ≤ ‖f‖ * ‖z‖ ^ (n - k) := by apply MultilinearMap.mkContinuous_norm_le exact mul_nonneg (norm_nonneg _) (pow_nonneg (norm_nonneg _) _) section variable {A : Type} [NormedCommRing A] [NormedAlgebra 𝕜 A] @[simp] theorem norm_mkPiAlgebra_le [Nonempty ι] : ‖ContinuousMultilinearMap.mkPiAlgebra 𝕜 ι A‖ ≤ 1 := by refine opNorm_le_bound zero_le_one fun m => ?_ simp only [ContinuousMultilinearMap.mkPiAlgebra_apply, one_mul] exact norm_prod_le' _ univ_nonempty _ theorem norm_mkPiAlgebra_of_empty [IsEmpty ι] : ‖ContinuousMultilinearMap.mkPiAlgebra 𝕜 ι A‖ = ‖(1 : A)‖ := by apply le_antisymm · apply opNorm_le_bound <;> simp · convert ratio_le_opNorm (ContinuousMultilinearMap.mkPiAlgebra 𝕜 ι A) fun _ => 1 simp [eq_empty_of_isEmpty univ] @[simp] theorem norm_mkPiAlgebra [NormOneClass A] : ‖ContinuousMultilinearMap.mkPiAlgebra 𝕜 ι A‖ = 1 := by cases isEmpty_or_nonempty ι · simp [norm_mkPiAlgebra_of_empty] · refine le_antisymm norm_mkPiAlgebra_le ?_ convert ratio_le_opNorm (ContinuousMultilinearMap.mkPiAlgebra 𝕜 ι A) fun _ => 1 simp end section variable {n : ℕ} {A : Type} [SeminormedRing A] [NormedAlgebra 𝕜 A] theorem norm_mkPiAlgebraFin_succ_le : ‖ContinuousMultilinearMap.mkPiAlgebraFin 𝕜 n.succ A‖ ≤ 1 := by refine opNorm_le_bound zero_le_one fun m => ?_ simp only [ContinuousMultilinearMap.mkPiAlgebraFin_apply, one_mul, List.ofFn_eq_map, Fin.prod_univ_def, Multiset.map_coe, Multiset.prod_coe] refine (List.norm_prod_le' ?_).trans_eq ?_ · rw [Ne, List.map_eq_nil_iff, List.finRange_eq_nil] exact Nat.succ_ne_zero _ rw [List.map_map, Function.comp_def] theorem norm_mkPiAlgebraFin_le_of_pos (hn : 0 < n) : ‖ContinuousMultilinearMap.mkPiAlgebraFin 𝕜 n A‖ ≤ 1 := by obtain ⟨n, rfl⟩ := Nat.exists_eq_succ_of_ne_zero hn.ne' exact norm_mkPiAlgebraFin_succ_le theorem norm_mkPiAlgebraFin_zero : ‖ContinuousMultilinearMap.mkPiAlgebraFin 𝕜 0 A‖ = ‖(1 : A)‖ := by refine le_antisymm ?_ ?_ · refine opNorm_le_bound (norm_nonneg (1 : A)) ?_ simp · convert ratio_le_opNorm (ContinuousMultilinearMap.mkPiAlgebraFin 𝕜 0 A) fun _ => (1 : A) simp theorem norm_mkPiAlgebraFin_le : ‖ContinuousMultilinearMap.mkPiAlgebraFin 𝕜 n A‖ ≤ max 1 ‖(1 : A)‖ := by cases n · exact norm_mkPiAlgebraFin_zero.le.trans (le_max_right _ _) · exact (norm_mkPiAlgebraFin_le_of_pos (Nat.zero_lt_succ _)).trans (le_max_left _ _) @[simp] theorem norm_mkPiAlgebraFin [NormOneClass A] : ‖ContinuousMultilinearMap.mkPiAlgebraFin 𝕜 n A‖ = 1 := by cases n · rw [norm_mkPiAlgebraFin_zero] simp · refine le_antisymm norm_mkPiAlgebraFin_succ_le ?_ refine le_of_eq_of_le ?_ <\| ratio_le_opNorm (ContinuousMultilinearMap.mkPiAlgebraFin 𝕜 (Nat.succ _) A) fun _ => 1 simp end @[simp] theorem nnnorm_smulRight (f : ContinuousMultilinearMap 𝕜 E 𝕜) (z : G) : ‖f.smulRight z‖₊ = ‖f‖₊ * ‖z‖₊ := by refine le_antisymm ?_ ?_ · refine opNNNorm_le_iff.2 fun m => (nnnorm_smul_le _ _).trans ?_ rw [mul_right_comm] gcongr exact le_opNNNorm _ _ · obtain hz \| hz := eq_zero_or_pos ‖z‖₊ · simp [hz] rw [← le_div_iff₀ hz, opNNNorm_le_iff] intro m rw [div_mul_eq_mul_div, le_div_iff₀ hz] refine le_trans ?_ ((f.smulRight z).le_opNNNorm m) rw [smulRight_apply, nnnorm_smul] @[simp] theorem norm_smulRight (f : ContinuousMultilinearMap 𝕜 E 𝕜) (z : G) : ‖f.smulRight z‖ = ‖f‖ * ‖z‖ := congr_arg NNReal.toReal (nnnorm_smulRight f z) @[simp] theorem norm_mkPiRing (z : G) : ‖ContinuousMultilinearMap.mkPiRing 𝕜 ι z‖ = ‖z‖ := by rw [ContinuousMultilinearMap.mkPiRing, norm_smulRight, norm_mkPiAlgebra, one_mul] variable (𝕜 E G) in /-- Continuous bilinear map realizing `(f, z) ↦ f.smulRight z`. -/ def smulRightL : ContinuousMultilinearMap 𝕜 E 𝕜 →L[𝕜] G →L[𝕜] ContinuousMultilinearMap 𝕜 E G := LinearMap.mkContinuous₂ { toFun := fun f ↦ { toFun := fun z ↦ f.smulRight z map_add' := fun x y ↦ by ext; simp map_smul' := fun c x ↦ by ext; simp [smul_smul, mul_comm] } map_add' := fun f g ↦ by ext; simp [add_smul] map_smul' := fun c f ↦ by ext; simp [smul_smul] } 1 (fun f z ↦ by simp [norm_smulRight]) @[simp] lemma smulRightL_apply (f : ContinuousMultilinearMap 𝕜 E 𝕜) (z : G) : smulRightL 𝕜 E G f z = f.smulRight z := rfl lemma norm_smulRightL_le : ‖smulRightL 𝕜 E G‖ ≤ 1 := LinearMap.mkContinuous₂_norm_le _ zero_le_one _ variable (𝕜 ι G) /-- Continuous multilinear maps on `𝕜^n` with values in `G` are in bijection with `G`, as such a continuous multilinear map is completely determined by its value on the constant vector made of ones. We register this bijection as a linear isometry in `ContinuousMultilinearMap.piFieldEquiv`. -/ protected def piFieldEquiv : G ≃ₗᵢ[𝕜] ContinuousMultilinearMap 𝕜 (fun _ : ι => 𝕜) G where toFun z := ContinuousMultilinearMap.mkPiRing 𝕜 ι z invFun f := f fun _ => 1 map_add' z z' := by ext m simp [smul_add] map_smul' c z := by ext m simp [smul_smul, mul_comm] left_inv z := by simp right_inv f := f.mkPiRing_apply_one_eq_self norm_map' := norm_mkPiRing end ContinuousMultilinearMap	namespace ContinuousLinearMap theorem norm_compContinuousMultilinearMap_le (g : G →L[𝕜] G') (f : ContinuousMultilinearMap 𝕜 E G) : ‖g.compContinuousMultilinearMap f‖ ≤ ‖g‖ * ‖f‖ :=	Mathlib/Analysis/NormedSpace/Multilinear/Basic.lean	837	840
/- Copyright (c) 2015 Microsoft Corporation. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Data.Multiset.ZeroCons /-! # Basic results on multisets -/ -- No algebra should be required assert_not_exists Monoid universe v open List Subtype Nat Function variable {α : Type} {β : Type v} {γ : Type} namespace Multiset /-! ### `Multiset.toList` -/ section ToList /-- Produces a list of the elements in the multiset using choice. -/ noncomputable def toList (s : Multiset α) := s.out @[simp, norm_cast] theorem coe_toList (s : Multiset α) : (s.toList : Multiset α) = s := s.out_eq' @[simp] theorem toList_eq_nil {s : Multiset α} : s.toList = [] ↔ s = 0 := by rw [← coe_eq_zero, coe_toList] theorem empty_toList {s : Multiset α} : s.toList.isEmpty ↔ s = 0 := by simp @[simp] theorem toList_zero : (Multiset.toList 0 : List α) = [] := toList_eq_nil.mpr rfl @[simp] theorem mem_toList {a : α} {s : Multiset α} : a ∈ s.toList ↔ a ∈ s := by rw [← mem_coe, coe_toList] @[simp] theorem toList_eq_singleton_iff {a : α} {m : Multiset α} : m.toList = [a] ↔ m = {a} := by rw [← perm_singleton, ← coe_eq_coe, coe_toList, coe_singleton] @[simp] theorem toList_singleton (a : α) : ({a} : Multiset α).toList = [a] := Multiset.toList_eq_singleton_iff.2 rfl @[simp] theorem length_toList (s : Multiset α) : s.toList.length = card s := by rw [← coe_card, coe_toList] end ToList /-! ### Induction principles -/ /-- The strong induction principle for multisets. -/ @[elab_as_elim] def strongInductionOn {p : Multiset α → Sort} (s : Multiset α) (ih : ∀ s, (∀ t < s, p t) → p s) : p s := (ih s) fun t _h => strongInductionOn t ih termination_by card s decreasing_by exact card_lt_card _h theorem strongInductionOn_eq {p : Multiset α → Sort} (s : Multiset α) (H) : @strongInductionOn _ p s H = H s fun t _h => @strongInductionOn _ p t H := by rw [strongInductionOn] @[elab_as_elim] theorem case_strongInductionOn {p : Multiset α → Prop} (s : Multiset α) (h₀ : p 0) (h₁ : ∀ a s, (∀ t ≤ s, p t) → p (a ::ₘ s)) : p s := Multiset.strongInductionOn s fun s => Multiset.induction_on s (fun _ => h₀) fun _a _s _ ih => (h₁ _ _) fun _t h => ih _ <\| lt_of_le_of_lt h <\| lt_cons_self _ _ /-- Suppose that, given that `p t` can be defined on all supersets of `s` of cardinality less than `n`, one knows how to define `p s`. Then one can inductively define `p s` for all multisets `s` of cardinality less than `n`, starting from multisets of card `n` and iterating. This can be used either to define data, or to prove properties. -/ def strongDownwardInduction {p : Multiset α → Sort} {n : ℕ} (H : ∀ t₁, (∀ {t₂ : Multiset α}, card t₂ ≤ n → t₁ < t₂ → p t₂) → card t₁ ≤ n → p t₁) (s : Multiset α) : card s ≤ n → p s := H s fun {t} ht _h => strongDownwardInduction H t ht termination_by n - card s decreasing_by simp_wf; have := (card_lt_card _h); omega theorem strongDownwardInduction_eq {p : Multiset α → Sort} {n : ℕ} (H : ∀ t₁, (∀ {t₂ : Multiset α}, card t₂ ≤ n → t₁ < t₂ → p t₂) → card t₁ ≤ n → p t₁) (s : Multiset α) : strongDownwardInduction H s = H s fun ht _hst => strongDownwardInduction H _ ht := by rw [strongDownwardInduction] /-- Analogue of `strongDownwardInduction` with order of arguments swapped. -/ @[elab_as_elim] def strongDownwardInductionOn {p : Multiset α → Sort} {n : ℕ} : ∀ s : Multiset α, (∀ t₁, (∀ {t₂ : Multiset α}, card t₂ ≤ n → t₁ < t₂ → p t₂) → card t₁ ≤ n → p t₁) → card s ≤ n → p s := fun s H => strongDownwardInduction H s theorem strongDownwardInductionOn_eq {p : Multiset α → Sort} (s : Multiset α) {n : ℕ} (H : ∀ t₁, (∀ {t₂ : Multiset α}, card t₂ ≤ n → t₁ < t₂ → p t₂) → card t₁ ≤ n → p t₁) : s.strongDownwardInductionOn H = H s fun {t} ht _h => t.strongDownwardInductionOn H ht := by dsimp only [strongDownwardInductionOn] rw [strongDownwardInduction] section Choose variable (p : α → Prop) [DecidablePred p] (l : Multiset α) /-- Given a proof `hp` that there exists a unique `a ∈ l` such that `p a`, `chooseX p l hp` returns that `a` together with proofs of `a ∈ l` and `p a`. -/ def chooseX : ∀ _hp : ∃! a, a ∈ l ∧ p a, { a // a ∈ l ∧ p a } := Quotient.recOn l (fun l' ex_unique => List.chooseX p l' (ExistsUnique.exists ex_unique)) (by intros a b _ funext hp suffices all_equal : ∀ x y : { t // t ∈ b ∧ p t }, x = y by apply all_equal rintro ⟨x, px⟩ ⟨y, py⟩ rcases hp with ⟨z, ⟨_z_mem_l, _pz⟩, z_unique⟩ congr calc x = z := z_unique x px _ = y := (z_unique y py).symm ) /-- Given a proof `hp` that there exists a unique `a ∈ l` such that `p a`, `choose p l hp` returns that `a`. -/ 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 variable (α) in /-- The equivalence between lists and multisets of a subsingleton type. -/ def subsingletonEquiv [Subsingleton α] : List α ≃ Multiset α where toFun := ofList invFun := (Quot.lift id) fun (a b : List α) (h : a ~ b) => (List.ext_get h.length_eq) fun _ _ _ => Subsingleton.elim _ _ left_inv _ := rfl right_inv m := Quot.inductionOn m fun _ => rfl @[simp] theorem coe_subsingletonEquiv [Subsingleton α] : (subsingletonEquiv α : List α → Multiset α) = ofList := rfl section SizeOf 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 : Multiset α} (hx : x ∈ s) : SizeOf.sizeOf x < SizeOf.sizeOf s := by induction s using Quot.inductionOn exact List.sizeOf_lt_sizeOf_of_mem hx end SizeOf end Multiset		Mathlib/Data/Multiset/Basic.lean	1,792	1,793
/- Copyright (c) 2020 Anatole Dedecker. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Anatole Dedecker -/ import Mathlib.Analysis.Calculus.Deriv.Inv import Mathlib.Analysis.Calculus.Deriv.MeanValue /-! # L'Hôpital's rule for 0/0 indeterminate forms In this file, we prove several forms of "L'Hôpital's rule" for computing 0/0 indeterminate forms. The proof of `HasDerivAt.lhopital_zero_right_on_Ioo` is based on the one given in the corresponding [Wikibooks](https://en.wikibooks.org/wiki/Calculus/L%27H%C3%B4pital%27s_Rule) chapter, and all other statements are derived from this one by composing by carefully chosen functions. Note that the filter `f'/g'` tends to isn't required to be one of `𝓝 a`, `atTop` or `atBot`. In fact, we give a slightly stronger statement by allowing it to be any filter on `ℝ`. Each statement is available in a `HasDerivAt` form and a `deriv` form, which is denoted by each statement being in either the `HasDerivAt` or the `deriv` namespace. ## Tags L'Hôpital's rule, L'Hopital's rule -/ open Filter Set open scoped Filter Topology Pointwise variable {a b : ℝ} {l : Filter ℝ} {f f' g g' : ℝ → ℝ} /-! ## Interval-based versions We start by proving statements where all conditions (derivability, `g' ≠ 0`) have to be satisfied on an explicitly-provided interval. -/ namespace HasDerivAt theorem lhopital_zero_right_on_Ioo (hab : a < b) (hff' : ∀ x ∈ Ioo a b, HasDerivAt f (f' x) x) (hgg' : ∀ x ∈ Ioo a b, HasDerivAt g (g' x) x) (hg' : ∀ x ∈ Ioo a b, g' x ≠ 0) (hfa : Tendsto f (𝓝[>] a) (𝓝 0)) (hga : Tendsto g (𝓝[>] a) (𝓝 0)) (hdiv : Tendsto (fun x => f' x / g' x) (𝓝[>] a) l) : Tendsto (fun x => f x / g x) (𝓝[>] a) l := by have sub : ∀ x ∈ Ioo a b, Ioo a x ⊆ Ioo a b := fun x hx => Ioo_subset_Ioo (le_refl a) (le_of_lt hx.2) have hg : ∀ x ∈ Ioo a b, g x ≠ 0 := by intro x hx h have : Tendsto g (𝓝[<] x) (𝓝 0) := by rw [← h, ← nhdsWithin_Ioo_eq_nhdsLT hx.1] exact ((hgg' x hx).continuousAt.continuousWithinAt.mono <\| sub x hx).tendsto obtain ⟨y, hyx, hy⟩ : ∃ c ∈ Ioo a x, g' c = 0 := exists_hasDerivAt_eq_zero' hx.1 hga this fun y hy => hgg' y <\| sub x hx hy exact hg' y (sub x hx hyx) hy have : ∀ x ∈ Ioo a b, ∃ c ∈ Ioo a x, f x * g' c = g x * f' c := by intro x hx rw [← sub_zero (f x), ← sub_zero (g x)] exact exists_ratio_hasDerivAt_eq_ratio_slope' g g' hx.1 f f' (fun y hy => hgg' y <\| sub x hx hy) (fun y hy => hff' y <\| sub x hx hy) hga hfa (tendsto_nhdsWithin_of_tendsto_nhds (hgg' x hx).continuousAt.tendsto) (tendsto_nhdsWithin_of_tendsto_nhds (hff' x hx).continuousAt.tendsto) choose! c hc using this have : ∀ x ∈ Ioo a b, ((fun x' => f' x' / g' x') ∘ c) x = f x / g x := by intro x hx rcases hc x hx with ⟨h₁, h₂⟩ field_simp [hg x hx, hg' (c x) ((sub x hx) h₁)] simp only [h₂] rw [mul_comm] have cmp : ∀ x ∈ Ioo a b, a < c x ∧ c x < x := fun x hx => (hc x hx).1 rw [← nhdsWithin_Ioo_eq_nhdsGT hab] apply tendsto_nhdsWithin_congr this apply hdiv.comp refine tendsto_nhdsWithin_of_tendsto_nhds_of_eventually_within _ (tendsto_of_tendsto_of_tendsto_of_le_of_le' tendsto_const_nhds (tendsto_nhdsWithin_of_tendsto_nhds tendsto_id) ?_ ?_) ?_ all_goals apply eventually_nhdsWithin_of_forall intro x hx have := cmp x hx try simp linarith [this] theorem lhopital_zero_right_on_Ico (hab : a < b) (hff' : ∀ x ∈ Ioo a b, HasDerivAt f (f' x) x) (hgg' : ∀ x ∈ Ioo a b, HasDerivAt g (g' x) x) (hcf : ContinuousOn f (Ico a b)) (hcg : ContinuousOn g (Ico a b)) (hg' : ∀ x ∈ Ioo a b, g' x ≠ 0) (hfa : f a = 0) (hga : g a = 0) (hdiv : Tendsto (fun x => f' x / g' x) (𝓝[>] a) l) : Tendsto (fun x => f x / g x) (𝓝[>] a) l := by refine lhopital_zero_right_on_Ioo hab hff' hgg' hg' ?_ ?_ hdiv · rw [← hfa, ← nhdsWithin_Ioo_eq_nhdsGT hab] exact ((hcf a <\| left_mem_Ico.mpr hab).mono Ioo_subset_Ico_self).tendsto · rw [← hga, ← nhdsWithin_Ioo_eq_nhdsGT hab] exact ((hcg a <\| left_mem_Ico.mpr hab).mono Ioo_subset_Ico_self).tendsto theorem lhopital_zero_left_on_Ioo (hab : a < b) (hff' : ∀ x ∈ Ioo a b, HasDerivAt f (f' x) x) (hgg' : ∀ x ∈ Ioo a b, HasDerivAt g (g' x) x) (hg' : ∀ x ∈ Ioo a b, g' x ≠ 0) (hfb : Tendsto f (𝓝[<] b) (𝓝 0)) (hgb : Tendsto g (𝓝[<] b) (𝓝 0)) (hdiv : Tendsto (fun x => f' x / g' x) (𝓝[<] b) l) : Tendsto (fun x => f x / g x) (𝓝[<] b) l := by -- Here, we essentially compose by `Neg.neg`. The following is mostly technical details. have hdnf : ∀ x ∈ -Ioo a b, HasDerivAt (f ∘ Neg.neg) (f' (-x) * -1) x := fun x hx => comp x (hff' (-x) hx) (hasDerivAt_neg x) have hdng : ∀ x ∈ -Ioo a b, HasDerivAt (g ∘ Neg.neg) (g' (-x) * -1) x := fun x hx => comp x (hgg' (-x) hx) (hasDerivAt_neg x) rw [neg_Ioo] at hdnf rw [neg_Ioo] at hdng have := lhopital_zero_right_on_Ioo (neg_lt_neg hab) hdnf hdng (by intro x hx h apply hg' _ (by rw [← neg_Ioo] at hx; exact hx) rwa [mul_comm, ← neg_eq_neg_one_mul, neg_eq_zero] at h) (hfb.comp tendsto_neg_nhdsGT_neg) (hgb.comp tendsto_neg_nhdsGT_neg) (by simp only [neg_div_neg_eq, mul_one, mul_neg] exact hdiv.comp tendsto_neg_nhdsGT_neg) have := this.comp tendsto_neg_nhdsLT unfold Function.comp at this simpa only [neg_neg] theorem lhopital_zero_left_on_Ioc (hab : a < b) (hff' : ∀ x ∈ Ioo a b, HasDerivAt f (f' x) x) (hgg' : ∀ x ∈ Ioo a b, HasDerivAt g (g' x) x) (hcf : ContinuousOn f (Ioc a b)) (hcg : ContinuousOn g (Ioc a b)) (hg' : ∀ x ∈ Ioo a b, g' x ≠ 0) (hfb : f b = 0) (hgb : g b = 0) (hdiv : Tendsto (fun x => f' x / g' x) (𝓝[<] b) l) : Tendsto (fun x => f x / g x) (𝓝[<] b) l := by refine lhopital_zero_left_on_Ioo hab hff' hgg' hg' ?_ ?_ hdiv · rw [← hfb, ← nhdsWithin_Ioo_eq_nhdsLT hab] exact ((hcf b <\| right_mem_Ioc.mpr hab).mono Ioo_subset_Ioc_self).tendsto · rw [← hgb, ← nhdsWithin_Ioo_eq_nhdsLT hab] exact ((hcg b <\| right_mem_Ioc.mpr hab).mono Ioo_subset_Ioc_self).tendsto theorem lhopital_zero_atTop_on_Ioi (hff' : ∀ x ∈ Ioi a, HasDerivAt f (f' x) x) (hgg' : ∀ x ∈ Ioi a, HasDerivAt g (g' x) x) (hg' : ∀ x ∈ Ioi a, g' x ≠ 0) (hftop : Tendsto f atTop (𝓝 0)) (hgtop : Tendsto g atTop (𝓝 0)) (hdiv : Tendsto (fun x => f' x / g' x) atTop l) : Tendsto (fun x => f x / g x) atTop l := by obtain ⟨a', haa', ha'⟩ : ∃ a', a < a' ∧ 0 < a' := ⟨1 + max a 0, ⟨lt_of_le_of_lt (le_max_left a 0) (lt_one_add _), lt_of_le_of_lt (le_max_right a 0) (lt_one_add _)⟩⟩ have fact1 : ∀ x : ℝ, x ∈ Ioo 0 a'⁻¹ → x ≠ 0 := fun _ hx => (ne_of_lt hx.1).symm have fact2 (x) (hx : x ∈ Ioo 0 a'⁻¹) : a < x⁻¹ := lt_trans haa' ((lt_inv_comm₀ ha' hx.1).mpr hx.2) have hdnf : ∀ x ∈ Ioo 0 a'⁻¹, HasDerivAt (f ∘ Inv.inv) (f' x⁻¹ * -(x ^ 2)⁻¹) x := fun x hx => comp x (hff' x⁻¹ <\| fact2 x hx) (hasDerivAt_inv <\| fact1 x hx) have hdng : ∀ x ∈ Ioo 0 a'⁻¹, HasDerivAt (g ∘ Inv.inv) (g' x⁻¹ * -(x ^ 2)⁻¹) x := fun x hx => comp x (hgg' x⁻¹ <\| fact2 x hx) (hasDerivAt_inv <\| fact1 x hx) have := lhopital_zero_right_on_Ioo (inv_pos.mpr ha') hdnf hdng (by intro x hx refine mul_ne_zero ?_ (neg_ne_zero.mpr <\| inv_ne_zero <\| pow_ne_zero _ <\| fact1 x hx) exact hg' _ (fact2 x hx)) (hftop.comp tendsto_inv_nhdsGT_zero) (hgtop.comp tendsto_inv_nhdsGT_zero) (by refine (tendsto_congr' ?_).mp (hdiv.comp tendsto_inv_nhdsGT_zero) filter_upwards [self_mem_nhdsWithin] with x (hx : 0 < x) simp only [Function.comp_def] rw [mul_div_mul_right] exact neg_ne_zero.mpr (by positivity)) have := this.comp tendsto_inv_atTop_nhdsGT_zero unfold Function.comp at this simpa only [inv_inv] theorem lhopital_zero_atBot_on_Iio (hff' : ∀ x ∈ Iio a, HasDerivAt f (f' x) x) (hgg' : ∀ x ∈ Iio a, HasDerivAt g (g' x) x) (hg' : ∀ x ∈ Iio a, g' x ≠ 0) (hfbot : Tendsto f atBot (𝓝 0)) (hgbot : Tendsto g atBot (𝓝 0)) (hdiv : Tendsto (fun x => f' x / g' x) atBot l) : Tendsto (fun x => f x / g x) atBot l := by -- Here, we essentially compose by `Neg.neg`. The following is mostly technical details. have hdnf : ∀ x ∈ -Iio a, HasDerivAt (f ∘ Neg.neg) (f' (-x) * -1) x := fun x hx => comp x (hff' (-x) hx) (hasDerivAt_neg x) have hdng : ∀ x ∈ -Iio a, HasDerivAt (g ∘ Neg.neg) (g' (-x) * -1) x := fun x hx => comp x (hgg' (-x) hx) (hasDerivAt_neg x) rw [neg_Iio] at hdnf rw [neg_Iio] at hdng have := lhopital_zero_atTop_on_Ioi hdnf hdng (by intro x hx h apply hg' _ (by rw [← neg_Iio] at hx; exact hx) rwa [mul_comm, ← neg_eq_neg_one_mul, neg_eq_zero] at h) (hfbot.comp tendsto_neg_atTop_atBot) (hgbot.comp tendsto_neg_atTop_atBot) (by simp only [mul_one, mul_neg, neg_div_neg_eq] exact (hdiv.comp tendsto_neg_atTop_atBot)) have := this.comp tendsto_neg_atBot_atTop unfold Function.comp at this simpa only [neg_neg] end HasDerivAt namespace deriv theorem lhopital_zero_right_on_Ioo (hab : a < b) (hdf : DifferentiableOn ℝ f (Ioo a b)) (hg' : ∀ x ∈ Ioo a b, deriv g x ≠ 0) (hfa : Tendsto f (𝓝[>] a) (𝓝 0)) (hga : Tendsto g (𝓝[>] a) (𝓝 0)) (hdiv : Tendsto (fun x => (deriv f) x / (deriv g) x) (𝓝[>] a) l) : Tendsto (fun x => f x / g x) (𝓝[>] a) l := by have hdf : ∀ x ∈ Ioo a b, DifferentiableAt ℝ f x := fun x hx => (hdf x hx).differentiableAt (Ioo_mem_nhds hx.1 hx.2) have hdg : ∀ x ∈ Ioo a b, DifferentiableAt ℝ g x := fun x hx => by_contradiction fun h => hg' x hx (deriv_zero_of_not_differentiableAt h) exact HasDerivAt.lhopital_zero_right_on_Ioo hab (fun x hx => (hdf x hx).hasDerivAt) (fun x hx => (hdg x hx).hasDerivAt) hg' hfa hga hdiv theorem lhopital_zero_right_on_Ico (hab : a < b) (hdf : DifferentiableOn ℝ f (Ioo a b)) (hcf : ContinuousOn f (Ico a b)) (hcg : ContinuousOn g (Ico a b)) (hg' : ∀ x ∈ Ioo a b, (deriv g) x ≠ 0) (hfa : f a = 0) (hga : g a = 0) (hdiv : Tendsto (fun x => (deriv f) x / (deriv g) x) (𝓝[>] a) l) : Tendsto (fun x => f x / g x) (𝓝[>] a) l := by refine lhopital_zero_right_on_Ioo hab hdf hg' ?_ ?_ hdiv · rw [← hfa, ← nhdsWithin_Ioo_eq_nhdsGT hab] exact ((hcf a <\| left_mem_Ico.mpr hab).mono Ioo_subset_Ico_self).tendsto · rw [← hga, ← nhdsWithin_Ioo_eq_nhdsGT hab] exact ((hcg a <\| left_mem_Ico.mpr hab).mono Ioo_subset_Ico_self).tendsto theorem lhopital_zero_left_on_Ioo (hab : a < b) (hdf : DifferentiableOn ℝ f (Ioo a b)) (hg' : ∀ x ∈ Ioo a b, (deriv g) x ≠ 0) (hfb : Tendsto f (𝓝[<] b) (𝓝 0)) (hgb : Tendsto g (𝓝[<] b) (𝓝 0)) (hdiv : Tendsto (fun x => (deriv f) x / (deriv g) x) (𝓝[<] b) l) : Tendsto (fun x => f x / g x) (𝓝[<] b) l := by have hdf : ∀ x ∈ Ioo a b, DifferentiableAt ℝ f x := fun x hx => (hdf x hx).differentiableAt (Ioo_mem_nhds hx.1 hx.2) have hdg : ∀ x ∈ Ioo a b, DifferentiableAt ℝ g x := fun x hx => by_contradiction fun h => hg' x hx (deriv_zero_of_not_differentiableAt h) exact HasDerivAt.lhopital_zero_left_on_Ioo hab (fun x hx => (hdf x hx).hasDerivAt) (fun x hx => (hdg x hx).hasDerivAt) hg' hfb hgb hdiv theorem lhopital_zero_atTop_on_Ioi (hdf : DifferentiableOn ℝ f (Ioi a)) (hg' : ∀ x ∈ Ioi a, (deriv g) x ≠ 0) (hftop : Tendsto f atTop (𝓝 0)) (hgtop : Tendsto g atTop (𝓝 0)) (hdiv : Tendsto (fun x => (deriv f) x / (deriv g) x) atTop l) : Tendsto (fun x => f x / g x) atTop l := by have hdf : ∀ x ∈ Ioi a, DifferentiableAt ℝ f x := fun x hx => (hdf x hx).differentiableAt (Ioi_mem_nhds hx) have hdg : ∀ x ∈ Ioi a, DifferentiableAt ℝ g x := fun x hx => by_contradiction fun h => hg' x hx (deriv_zero_of_not_differentiableAt h) exact HasDerivAt.lhopital_zero_atTop_on_Ioi (fun x hx => (hdf x hx).hasDerivAt) (fun x hx => (hdg x hx).hasDerivAt) hg' hftop hgtop hdiv theorem lhopital_zero_atBot_on_Iio (hdf : DifferentiableOn ℝ f (Iio a)) (hg' : ∀ x ∈ Iio a, (deriv g) x ≠ 0) (hfbot : Tendsto f atBot (𝓝 0)) (hgbot : Tendsto g atBot (𝓝 0)) (hdiv : Tendsto (fun x => (deriv f) x / (deriv g) x) atBot l) : Tendsto (fun x => f x / g x) atBot l := by have hdf : ∀ x ∈ Iio a, DifferentiableAt ℝ f x := fun x hx => (hdf x hx).differentiableAt (Iio_mem_nhds hx) have hdg : ∀ x ∈ Iio a, DifferentiableAt ℝ g x := fun x hx => by_contradiction fun h => hg' x hx (deriv_zero_of_not_differentiableAt h) exact HasDerivAt.lhopital_zero_atBot_on_Iio (fun x hx => (hdf x hx).hasDerivAt) (fun x hx => (hdg x hx).hasDerivAt) hg' hfbot hgbot hdiv end deriv /-! ## Generic versions The following statements no longer any explicit interval, as they only require conditions holding eventually. -/ namespace HasDerivAt /-- L'Hôpital's rule for approaching a real from the right, `HasDerivAt` version -/ theorem lhopital_zero_nhdsGT (hff' : ∀ᶠ x in 𝓝[>] a, HasDerivAt f (f' x) x) (hgg' : ∀ᶠ x in 𝓝[>] a, HasDerivAt g (g' x) x) (hg' : ∀ᶠ x in 𝓝[>] a, g' x ≠ 0) (hfa : Tendsto f (𝓝[>] a) (𝓝 0)) (hga : Tendsto g (𝓝[>] a) (𝓝 0)) (hdiv : Tendsto (fun x => f' x / g' x) (𝓝[>] a) l) : Tendsto (fun x => f x / g x) (𝓝[>] a) l := by rw [eventually_iff_exists_mem] at * rcases hff' with ⟨s₁, hs₁, hff'⟩ rcases hgg' with ⟨s₂, hs₂, hgg'⟩ rcases hg' with ⟨s₃, hs₃, hg'⟩ let s := s₁ ∩ s₂ ∩ s₃ have hs : s ∈ 𝓝[>] a := inter_mem (inter_mem hs₁ hs₂) hs₃ rw [mem_nhdsGT_iff_exists_Ioo_subset] at hs rcases hs with ⟨u, hau, hu⟩ refine lhopital_zero_right_on_Ioo hau ?_ ?_ ?_ hfa hga hdiv <;> intro x hx <;> apply_assumption <;> first \| exact (hu hx).1.1 \| exact (hu hx).1.2 \| exact (hu hx).2 @[deprecated (since := "2025-03-02")] alias lhopital_zero_nhds_right := lhopital_zero_nhdsGT /-- L'Hôpital's rule for approaching a real from the left, `HasDerivAt` version -/ theorem lhopital_zero_nhdsLT (hff' : ∀ᶠ x in 𝓝[<] a, HasDerivAt f (f' x) x) (hgg' : ∀ᶠ x in 𝓝[<] a, HasDerivAt g (g' x) x) (hg' : ∀ᶠ x in 𝓝[<] a, g' x ≠ 0) (hfa : Tendsto f (𝓝[<] a) (𝓝 0)) (hga : Tendsto g (𝓝[<] a) (𝓝 0)) (hdiv : Tendsto (fun x => f' x / g' x) (𝓝[<] a) l) : Tendsto (fun x => f x / g x) (𝓝[<] a) l := by rw [eventually_iff_exists_mem] at * rcases hff' with ⟨s₁, hs₁, hff'⟩ rcases hgg' with ⟨s₂, hs₂, hgg'⟩ rcases hg' with ⟨s₃, hs₃, hg'⟩ let s := s₁ ∩ s₂ ∩ s₃ have hs : s ∈ 𝓝[<] a := inter_mem (inter_mem hs₁ hs₂) hs₃ rw [mem_nhdsLT_iff_exists_Ioo_subset] at hs rcases hs with ⟨l, hal, hl⟩ refine lhopital_zero_left_on_Ioo hal ?_ ?_ ?_ hfa hga hdiv <;> intro x hx <;> apply_assumption <;> first \| exact (hl hx).1.1\| exact (hl hx).1.2\| exact (hl hx).2 @[deprecated (since := "2025-03-02")] alias lhopital_zero_nhds_left := lhopital_zero_nhdsLT /-- L'Hôpital's rule for approaching a real, `HasDerivAt` version. This does not require anything about the situation at `a` -/ theorem lhopital_zero_nhdsNE (hff' : ∀ᶠ x in 𝓝[≠] a, HasDerivAt f (f' x) x) (hgg' : ∀ᶠ x in 𝓝[≠] a, HasDerivAt g (g' x) x) (hg' : ∀ᶠ x in 𝓝[≠] a, g' x ≠ 0) (hfa : Tendsto f (𝓝[≠] a) (𝓝 0)) (hga : Tendsto g (𝓝[≠] a) (𝓝 0)) (hdiv : Tendsto (fun x => f' x / g' x) (𝓝[≠] a) l) : Tendsto (fun x => f x / g x) (𝓝[≠] a) l := by simp only [← Iio_union_Ioi, nhdsWithin_union, tendsto_sup, eventually_sup] at * exact ⟨lhopital_zero_nhdsLT hff'.1 hgg'.1 hg'.1 hfa.1 hga.1 hdiv.1, lhopital_zero_nhdsGT hff'.2 hgg'.2 hg'.2 hfa.2 hga.2 hdiv.2⟩ @[deprecated (since := "2025-03-02")] alias lhopital_zero_nhds' := lhopital_zero_nhdsNE /-- L'Hôpital's rule for approaching a real, `HasDerivAt` version -/	theorem lhopital_zero_nhds (hff' : ∀ᶠ x in 𝓝 a, HasDerivAt f (f' x) x) (hgg' : ∀ᶠ x in 𝓝 a, HasDerivAt g (g' x) x) (hg' : ∀ᶠ x in 𝓝 a, g' x ≠ 0) (hfa : Tendsto f (𝓝 a) (𝓝 0)) (hga : Tendsto g (𝓝 a) (𝓝 0)) (hdiv : Tendsto (fun x => f' x / g' x) (𝓝 a) l) : Tendsto (fun x => f x / g x) (𝓝[≠] a) l := by apply @lhopital_zero_nhdsNE _ _ _ f' _ g' <;> (first \| apply eventually_nhdsWithin_of_eventually_nhds \| apply tendsto_nhdsWithin_of_tendsto_nhds) <;> assumption	Mathlib/Analysis/Calculus/LHopital.lean	319	326
/- Copyright (c) 2022 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel -/ import Mathlib.Analysis.SpecialFunctions.Gaussian.GaussianIntegral import Mathlib.Analysis.Complex.CauchyIntegral import Mathlib.MeasureTheory.Integral.Pi import Mathlib.Analysis.Fourier.FourierTransform /-! # Fourier transform of the Gaussian We prove that the Fourier transform of the Gaussian function is another Gaussian: * `integral_cexp_quadratic`: general formula for `∫ (x : ℝ), exp (b * x ^ 2 + c * x + d)` * `fourierIntegral_gaussian`: for all complex `b` and `t` with `0 < re b`, we have `∫ x:ℝ, exp (I * t * x) * exp (-b * x^2) = (π / b) ^ (1 / 2) * exp (-t ^ 2 / (4 * b))`. * `fourierIntegral_gaussian_pi`: a variant with `b` and `t` scaled to give a more symmetric statement, and formulated in terms of the Fourier transform operator `𝓕`. We also give versions of these formulas in finite-dimensional inner product spaces, see `integral_cexp_neg_mul_sq_norm_add` and `fourierIntegral_gaussian_innerProductSpace`. -/ /-! ## Fourier integral of Gaussian functions -/ open Real Set MeasureTheory Filter Asymptotics intervalIntegral open scoped Real Topology FourierTransform RealInnerProductSpace open Complex hiding exp continuous_exp abs_of_nonneg sq_abs noncomputable section namespace GaussianFourier variable {b : ℂ} /-- The integral of the Gaussian function over the vertical edges of a rectangle with vertices at `(±T, 0)` and `(±T, c)`. -/ def verticalIntegral (b : ℂ) (c T : ℝ) : ℂ := ∫ y : ℝ in (0 : ℝ)..c, I * (cexp (-b * (T + y * I) ^ 2) - cexp (-b * (T - y * I) ^ 2)) /-- Explicit formula for the norm of the Gaussian function along the vertical edges. -/ theorem norm_cexp_neg_mul_sq_add_mul_I (b : ℂ) (c T : ℝ) : ‖cexp (-b * (T + c * I) ^ 2)‖ = exp (-(b.re * T ^ 2 - 2 * b.im * c * T - b.re * c ^ 2)) := by rw [Complex.norm_exp, neg_mul, neg_re, ← re_add_im b] simp only [sq, re_add_im, mul_re, mul_im, add_re, add_im, ofReal_re, ofReal_im, I_re, I_im] ring_nf theorem norm_cexp_neg_mul_sq_add_mul_I' (hb : b.re ≠ 0) (c T : ℝ) : ‖cexp (-b * (T + c * I) ^ 2)‖ = exp (-(b.re * (T - b.im * c / b.re) ^ 2 - c ^ 2 * (b.im ^ 2 / b.re + b.re))) := by have : b.re * T ^ 2 - 2 * b.im * c * T - b.re * c ^ 2 = b.re * (T - b.im * c / b.re) ^ 2 - c ^ 2 * (b.im ^ 2 / b.re + b.re) := by field_simp; ring rw [norm_cexp_neg_mul_sq_add_mul_I, this] theorem verticalIntegral_norm_le (hb : 0 < b.re) (c : ℝ) {T : ℝ} (hT : 0 ≤ T) : ‖verticalIntegral b c T‖ ≤ (2 : ℝ) * \|c\| * exp (-(b.re * T ^ 2 - (2 : ℝ) * \|b.im\| * \|c\| * T - b.re * c ^ 2)) := by -- first get uniform bound for integrand have vert_norm_bound : ∀ {T : ℝ}, 0 ≤ T → ∀ {c y : ℝ}, \|y\| ≤ \|c\| → ‖cexp (-b * (T + y * I) ^ 2)‖ ≤ exp (-(b.re * T ^ 2 - (2 : ℝ) * \|b.im\| * \|c\| * T - b.re * c ^ 2)) := by intro T hT c y hy rw [norm_cexp_neg_mul_sq_add_mul_I b] gcongr exp (- (_ - ?_ * _ - _ * ?_)) · (conv_lhs => rw [mul_assoc]); (conv_rhs => rw [mul_assoc]) gcongr _ * ?_ refine (le_abs_self _).trans ?_ rw [abs_mul] gcongr · rwa [sq_le_sq] -- now main proof apply (intervalIntegral.norm_integral_le_of_norm_le_const _).trans · rw [sub_zero] conv_lhs => simp only [mul_comm _ \|c\|] conv_rhs => conv => congr rw [mul_comm] rw [mul_assoc] · intro y hy have absy : \|y\| ≤ \|c\| := by rcases le_or_lt 0 c with (h \| h) · rw [uIoc_of_le h] at hy rw [abs_of_nonneg h, abs_of_pos hy.1] exact hy.2 · rw [uIoc_of_ge h.le] at hy rw [abs_of_neg h, abs_of_nonpos hy.2, neg_le_neg_iff] exact hy.1.le rw [norm_mul, norm_I, one_mul, two_mul] refine (norm_sub_le _ _).trans (add_le_add (vert_norm_bound hT absy) ?_) rw [← abs_neg y] at absy simpa only [neg_mul, ofReal_neg] using vert_norm_bound hT absy theorem tendsto_verticalIntegral (hb : 0 < b.re) (c : ℝ) : Tendsto (verticalIntegral b c) atTop (𝓝 0) := by -- complete proof using squeeze theorem: rw [tendsto_zero_iff_norm_tendsto_zero] refine tendsto_of_tendsto_of_tendsto_of_le_of_le' tendsto_const_nhds ?_ (Eventually.of_forall fun _ => norm_nonneg _) ((eventually_ge_atTop (0 : ℝ)).mp (Eventually.of_forall fun T hT => verticalIntegral_norm_le hb c hT)) rw [(by ring : 0 = 2 * \|c\| * 0)] refine (tendsto_exp_atBot.comp (tendsto_neg_atTop_atBot.comp ?_)).const_mul _ apply tendsto_atTop_add_const_right simp_rw [sq, ← mul_assoc, ← sub_mul] refine Tendsto.atTop_mul_atTop₀ (tendsto_atTop_add_const_right _ _ ?_) tendsto_id exact (tendsto_const_mul_atTop_of_pos hb).mpr tendsto_id theorem integrable_cexp_neg_mul_sq_add_real_mul_I (hb : 0 < b.re) (c : ℝ) : Integrable fun x : ℝ => cexp (-b * (x + c * I) ^ 2) := by refine ⟨(Complex.continuous_exp.comp (continuous_const.mul ((continuous_ofReal.add continuous_const).pow 2))).aestronglyMeasurable, ?_⟩ rw [← hasFiniteIntegral_norm_iff] simp_rw [norm_cexp_neg_mul_sq_add_mul_I' hb.ne', neg_sub _ (c ^ 2 * _), sub_eq_add_neg _ (b.re * _), Real.exp_add] suffices Integrable fun x : ℝ => exp (-(b.re * x ^ 2)) by exact (Integrable.comp_sub_right this (b.im * c / b.re)).hasFiniteIntegral.const_mul _ simp_rw [← neg_mul] apply integrable_exp_neg_mul_sq hb theorem integral_cexp_neg_mul_sq_add_real_mul_I (hb : 0 < b.re) (c : ℝ) : ∫ x : ℝ, cexp (-b * (x + c * I) ^ 2) = (π / b) ^ (1 / 2 : ℂ) := by refine tendsto_nhds_unique (intervalIntegral_tendsto_integral (integrable_cexp_neg_mul_sq_add_real_mul_I hb c) tendsto_neg_atTop_atBot tendsto_id) ?_ set I₁ := fun T => ∫ x : ℝ in -T..T, cexp (-b * (x + c * I) ^ 2) with HI₁ let I₂ := fun T : ℝ => ∫ x : ℝ in -T..T, cexp (-b * (x : ℂ) ^ 2) let I₄ := fun T : ℝ => ∫ y : ℝ in (0 : ℝ)..c, cexp (-b * (T + y * I) ^ 2) let I₅ := fun T : ℝ => ∫ y : ℝ in (0 : ℝ)..c, cexp (-b * (-T + y * I) ^ 2) have C : ∀ T : ℝ, I₂ T - I₁ T + I * I₄ T - I * I₅ T = 0 := by intro T have := integral_boundary_rect_eq_zero_of_differentiableOn (fun z => cexp (-b * z ^ 2)) (-T) (T + c * I) (by refine Differentiable.differentiableOn (Differentiable.const_mul ?_ _).cexp exact differentiable_pow 2) simpa only [neg_im, ofReal_im, neg_zero, ofReal_zero, zero_mul, add_zero, neg_re, ofReal_re, add_re, mul_re, I_re, mul_zero, I_im, tsub_zero, add_im, mul_im, mul_one, zero_add, Algebra.id.smul_eq_mul, ofReal_neg] using this simp_rw [id, ← HI₁] have : I₁ = fun T : ℝ => I₂ T + verticalIntegral b c T := by ext1 T specialize C T rw [sub_eq_zero] at C unfold verticalIntegral rw [intervalIntegral.integral_const_mul, intervalIntegral.integral_sub] · simp_rw [(fun a b => by rw [sq]; ring_nf : ∀ a b : ℂ, (a - b * I) ^ 2 = (-a + b * I) ^ 2)] change I₁ T = I₂ T + I * (I₄ T - I₅ T) rw [mul_sub, ← C] abel all_goals apply Continuous.intervalIntegrable; continuity rw [this, ← add_zero ((π / b : ℂ) ^ (1 / 2 : ℂ)), ← integral_gaussian_complex hb] refine Tendsto.add ?_ (tendsto_verticalIntegral hb c) exact intervalIntegral_tendsto_integral (integrable_cexp_neg_mul_sq hb) tendsto_neg_atTop_atBot tendsto_id theorem _root_.integral_cexp_quadratic (hb : b.re < 0) (c d : ℂ) : ∫ x : ℝ, cexp (b * x ^ 2 + c * x + d) = (π / -b) ^ (1 / 2 : ℂ) * cexp (d - c^2 / (4 * b)) := by have hb' : b ≠ 0 := by contrapose! hb; rw [hb, zero_re] have h (x : ℝ) : cexp (b * x ^ 2 + c * x + d) = cexp (- -b * (x + c / (2 * b)) ^ 2) * cexp (d - c ^ 2 / (4 * b)) := by simp_rw [← Complex.exp_add] congr 1 field_simp ring_nf simp_rw [h, MeasureTheory.integral_mul_const] rw [← re_add_im (c / (2 * b))] simp_rw [← add_assoc, ← ofReal_add] rw [integral_add_right_eq_self fun a : ℝ ↦ cexp (- -b * (↑a + ↑(c / (2 * b)).im * I) ^ 2), integral_cexp_neg_mul_sq_add_real_mul_I ((neg_re b).symm ▸ (neg_pos.mpr hb))] lemma _root_.integrable_cexp_quadratic' (hb : b.re < 0) (c d : ℂ) : Integrable (fun (x : ℝ) ↦ cexp (b * x ^ 2 + c * x + d)) := by have hb' : b ≠ 0 := by contrapose! hb; rw [hb, zero_re] by_contra H simpa [hb', pi_ne_zero, Complex.exp_ne_zero, integral_undef H] using integral_cexp_quadratic hb c d lemma _root_.integrable_cexp_quadratic (hb : 0 < b.re) (c d : ℂ) : Integrable (fun (x : ℝ) ↦ cexp (-b * x ^ 2 + c * x + d)) := by have : (-b).re < 0 := by simpa using hb exact integrable_cexp_quadratic' this c d theorem _root_.fourierIntegral_gaussian (hb : 0 < b.re) (t : ℂ) : ∫ x : ℝ, cexp (I * t * x) * cexp (-b * x ^ 2) = (π / b) ^ (1 / 2 : ℂ) * cexp (-t ^ 2 / (4 * b)) := by conv => enter [1, 2, x]; rw [← Complex.exp_add, add_comm, ← add_zero (-b * x ^ 2 + I * t * x)] rw [integral_cexp_quadratic (show (-b).re < 0 by rwa [neg_re, neg_lt_zero]), neg_neg, zero_sub, mul_neg, div_neg, neg_neg, mul_pow, I_sq, neg_one_mul, mul_comm] theorem _root_.fourierIntegral_gaussian_pi' (hb : 0 < b.re) (c : ℂ) : (𝓕 fun x : ℝ => cexp (-π * b * x ^ 2 + 2 * π * c * x)) = fun t : ℝ => 1 / b ^ (1 / 2 : ℂ) * cexp (-π / b * (t + I * c) ^ 2) := by haveI : b ≠ 0 := by contrapose! hb; rw [hb, zero_re] have h : (-↑π * b).re < 0 := by simpa only [neg_mul, neg_re, re_ofReal_mul, neg_lt_zero] using mul_pos pi_pos hb ext1 t simp_rw [fourierIntegral_real_eq_integral_exp_smul, smul_eq_mul, ← Complex.exp_add, ← add_assoc] have (x : ℝ) : ↑(-2 * π * x * t) * I + -π * b * x ^ 2 + 2 * π * c * x = -π * b * x ^ 2 + (-2 * π * I * t + 2 * π * c) * x + 0 := by push_cast; ring simp_rw [this, integral_cexp_quadratic h, neg_mul, neg_neg] congr 2 · rw [← div_div, div_self <\| ofReal_ne_zero.mpr pi_ne_zero, one_div, inv_cpow, ← one_div] rw [Ne, arg_eq_pi_iff, not_and_or, not_lt] exact Or.inl hb.le · field_simp [ofReal_ne_zero.mpr pi_ne_zero] ring_nf simp only [I_sq] ring theorem _root_.fourierIntegral_gaussian_pi (hb : 0 < b.re) : (𝓕 fun (x : ℝ) ↦ cexp (-π * b * x ^ 2)) = fun t : ℝ ↦ 1 / b ^ (1 / 2 : ℂ) * cexp (-π / b * t ^ 2) := by simpa only [mul_zero, zero_mul, add_zero] using fourierIntegral_gaussian_pi' hb 0 section InnerProductSpace variable {V : Type} [NormedAddCommGroup V] [InnerProductSpace ℝ V] [FiniteDimensional ℝ V] [MeasurableSpace V] [BorelSpace V] theorem integrable_cexp_neg_sum_mul_add {ι : Type} [Fintype ι] {b : ι → ℂ} (hb : ∀ i, 0 < (b i).re) (c : ι → ℂ) : Integrable (fun (v : ι → ℝ) ↦ cexp (- ∑ i, b i * (v i : ℂ) ^ 2 + ∑ i, c i * v i)) := by simp_rw [← Finset.sum_neg_distrib, ← Finset.sum_add_distrib, Complex.exp_sum, ← neg_mul] apply Integrable.fintype_prod (f := fun i (v : ℝ) ↦ cexp (-b i * v^2 + c i * v)) (fun i ↦ ?_) convert integrable_cexp_quadratic (hb i) (c i) 0 using 3 with x simp only [add_zero] theorem integrable_cexp_neg_mul_sum_add {ι : Type} [Fintype ι] (hb : 0 < b.re) (c : ι → ℂ) : Integrable (fun (v : ι → ℝ) ↦ cexp (- b ∑ i, (v i : ℂ) ^ 2 + ∑ i, c i * v i)) := by simp_rw [neg_mul, Finset.mul_sum] exact integrable_cexp_neg_sum_mul_add (fun _ ↦ hb) c theorem integrable_cexp_neg_mul_sq_norm_add_of_euclideanSpace {ι : Type} [Fintype ι] (hb : 0 < b.re) (c : ℂ) (w : EuclideanSpace ℝ ι) : Integrable (fun (v : EuclideanSpace ℝ ι) ↦ cexp (- b ‖v‖^2 + c * ⟪w, v⟫)) := by have := EuclideanSpace.volume_preserving_measurableEquiv ι rw [← MeasurePreserving.integrable_comp_emb this.symm (MeasurableEquiv.measurableEmbedding _)] simp only [neg_mul, Function.comp_def] convert integrable_cexp_neg_mul_sum_add hb (fun i ↦ c * w i) using 3 with v simp only [EuclideanSpace.measurableEquiv, MeasurableEquiv.symm_mk, MeasurableEquiv.coe_mk, EuclideanSpace.norm_eq, WithLp.equiv_symm_pi_apply, Real.norm_eq_abs, sq_abs, PiLp.inner_apply, RCLike.inner_apply, conj_trivial, ofReal_sum, ofReal_mul, Finset.mul_sum, neg_mul, Finset.sum_neg_distrib, mul_assoc, add_left_inj, neg_inj] norm_cast rw [sq_sqrt] · simp [Finset.mul_sum, mul_comm] · exact Finset.sum_nonneg (fun i _hi ↦ by positivity) /-- In a real inner product space, the complex exponential of minus the square of the norm plus a scalar product is integrable. Useful when discussing the Fourier transform of a Gaussian. -/ theorem integrable_cexp_neg_mul_sq_norm_add (hb : 0 < b.re) (c : ℂ) (w : V) : Integrable (fun (v : V) ↦ cexp (-b * ‖v‖^2 + c * ⟪w, v⟫)) := by let e := (stdOrthonormalBasis ℝ V).repr.symm rw [← e.measurePreserving.integrable_comp_emb e.toHomeomorph.measurableEmbedding] convert integrable_cexp_neg_mul_sq_norm_add_of_euclideanSpace hb c (e.symm w) with v simp only [neg_mul, Function.comp_apply, LinearIsometryEquiv.norm_map, LinearIsometryEquiv.symm_symm, conj_trivial, ofReal_sum, ofReal_mul, LinearIsometryEquiv.inner_map_eq_flip] theorem integral_cexp_neg_sum_mul_add {ι : Type} [Fintype ι] {b : ι → ℂ} (hb : ∀ i, 0 < (b i).re) (c : ι → ℂ) : ∫ v : ι → ℝ, cexp (- ∑ i, b i (v i : ℂ) ^ 2 + ∑ i, c i * v i) = ∏ i, (π / b i) ^ (1 / 2 : ℂ) * cexp (c i ^ 2 / (4 * b i)) := by simp_rw [← Finset.sum_neg_distrib, ← Finset.sum_add_distrib, Complex.exp_sum, ← neg_mul] rw [integral_fintype_prod_eq_prod (f := fun i (v : ℝ) ↦ cexp (-b i * v ^ 2 + c i * v))] congr with i have : (-b i).re < 0 := by simpa using hb i convert integral_cexp_quadratic this (c i) 0 using 1 <;> simp [div_neg] theorem integral_cexp_neg_mul_sum_add {ι : Type} [Fintype ι] (hb : 0 < b.re) (c : ι → ℂ) : ∫ v : ι → ℝ, cexp (- b ∑ i, (v i : ℂ) ^ 2 + ∑ i, c i * v i) = (π / b) ^ (Fintype.card ι / 2 : ℂ) * cexp ((∑ i, c i ^ 2) / (4 * b)) := by simp_rw [neg_mul, Finset.mul_sum, integral_cexp_neg_sum_mul_add (fun _ ↦ hb) c, one_div, Finset.prod_mul_distrib, Finset.prod_const, ← cpow_nat_mul, ← Complex.exp_sum, Fintype.card, Finset.sum_div, div_eq_mul_inv] theorem integral_cexp_neg_mul_sq_norm_add_of_euclideanSpace {ι : Type} [Fintype ι] (hb : 0 < b.re) (c : ℂ) (w : EuclideanSpace ℝ ι) : ∫ v : EuclideanSpace ℝ ι, cexp (- b ‖v‖^2 + c * ⟪w, v⟫) = (π / b) ^ (Fintype.card ι / 2 : ℂ) * cexp (c ^ 2 * ‖w‖^2 / (4 * b)) := by have := (EuclideanSpace.volume_preserving_measurableEquiv ι).symm rw [← this.integral_comp (MeasurableEquiv.measurableEmbedding _)] simp only [neg_mul, Function.comp_def] convert integral_cexp_neg_mul_sum_add hb (fun i ↦ c * w i) using 5 with _x y · simp only [EuclideanSpace.measurableEquiv, MeasurableEquiv.symm_mk, MeasurableEquiv.coe_mk, EuclideanSpace.norm_eq, WithLp.equiv_symm_pi_apply, Real.norm_eq_abs, sq_abs, neg_mul, neg_inj, mul_eq_mul_left_iff] norm_cast left rw [sq_sqrt] exact Finset.sum_nonneg (fun i _hi ↦ by positivity) · simp [PiLp.inner_apply, EuclideanSpace.measurableEquiv, Finset.mul_sum, mul_assoc] simp_rw [mul_comm] · simp only [EuclideanSpace.norm_eq, Real.norm_eq_abs, sq_abs, mul_pow, ← Finset.mul_sum] congr norm_cast rw [sq_sqrt] exact Finset.sum_nonneg (fun i _hi ↦ by positivity) theorem integral_cexp_neg_mul_sq_norm_add (hb : 0 < b.re) (c : ℂ) (w : V) : ∫ v : V, cexp (- b * ‖v‖^2 + c * ⟪w, v⟫) = (π / b) ^ (Module.finrank ℝ V / 2 : ℂ) * cexp (c ^ 2 * ‖w‖^2 / (4 * b)) := by let e := (stdOrthonormalBasis ℝ V).repr.symm rw [← e.measurePreserving.integral_comp e.toHomeomorph.measurableEmbedding] convert integral_cexp_neg_mul_sq_norm_add_of_euclideanSpace hb c (e.symm w) <;> simp [LinearIsometryEquiv.inner_map_eq_flip] theorem integral_cexp_neg_mul_sq_norm (hb : 0 < b.re) : ∫ v : V, cexp (- b * ‖v‖^2) = (π / b) ^ (Module.finrank ℝ V / 2 : ℂ) := by simpa using integral_cexp_neg_mul_sq_norm_add hb 0 (0 : V) theorem integral_rexp_neg_mul_sq_norm {b : ℝ} (hb : 0 < b) : ∫ v : V, rexp (- b * ‖v‖^2) = (π / b) ^ (Module.finrank ℝ V / 2 : ℝ) := by rw [← ofReal_inj] convert integral_cexp_neg_mul_sq_norm (show 0 < (b : ℂ).re from hb) (V := V) · change ofRealLI (∫ (v : V), rexp (-b * ‖v‖ ^ 2)) = ∫ (v : V), cexp (-↑b * ↑‖v‖ ^ 2) rw [← ofRealLI.integral_comp_comm] simp [ofRealLI] · rw [← ofReal_div, ofReal_cpow (by positivity)] simp theorem _root_.fourierIntegral_gaussian_innerProductSpace' (hb : 0 < b.re) (x w : V) : 𝓕 (fun v ↦ cexp (- b * ‖v‖^2 + 2 * π * Complex.I * ⟪x, v⟫)) w = (π / b) ^ (Module.finrank ℝ V / 2 : ℂ) * cexp (-π ^ 2 * ‖x - w‖ ^ 2 / b) := by simp only [neg_mul, fourierIntegral_eq', ofReal_neg, ofReal_mul, ofReal_ofNat, smul_eq_mul, ← Complex.exp_add, real_inner_comm w] convert integral_cexp_neg_mul_sq_norm_add hb (2 * π * Complex.I) (x - w) using 3 with v · congr 1 simp [inner_sub_left] ring · have : b ≠ 0 := by contrapose! hb; rw [hb, zero_re] field_simp [mul_pow] ring theorem _root_.fourierIntegral_gaussian_innerProductSpace (hb : 0 < b.re) (w : V) : 𝓕 (fun v ↦ cexp (- b * ‖v‖^2)) w = (π / b) ^ (Module.finrank ℝ V / 2 : ℂ) * cexp (-π ^ 2 * ‖w‖^2 / b) := by simpa using fourierIntegral_gaussian_innerProductSpace' hb 0 w end InnerProductSpace end GaussianFourier		Mathlib/Analysis/SpecialFunctions/Gaussian/FourierTransform.lean	382	385
/- 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]	Mathlib/CategoryTheory/Abelian/Pseudoelements.lean	110	111
/- Copyright (c) 2020 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Algebra.Group.Indicator import Mathlib.Order.ConditionallyCompleteLattice.Indexed import Mathlib.Algebra.Order.Group.Synonym import Mathlib.Algebra.Order.Group.Unbundled.Abs import Mathlib.Algebra.Order.Monoid.Canonical.Defs /-! # Support of a function in an order This file relates the support of a function to order constructions. -/ assert_not_exists MonoidWithZero open Set variable {ι : Sort} {α M : Type} namespace Function variable [One M] @[to_additive] lemma mulSupport_sup [SemilatticeSup M] (f g : α → M) : mulSupport (fun x ↦ f x ⊔ g x) ⊆ mulSupport f ∪ mulSupport g := mulSupport_binop_subset (· ⊔ ·) (sup_idem _) f g @[to_additive] lemma mulSupport_inf [SemilatticeInf M] (f g : α → M) : mulSupport (fun x ↦ f x ⊓ g x) ⊆ mulSupport f ∪ mulSupport g := mulSupport_binop_subset (· ⊓ ·) (inf_idem _) f g @[to_additive] lemma mulSupport_max [LinearOrder M] (f g : α → M) : mulSupport (fun x ↦ max (f x) (g x)) ⊆ mulSupport f ∪ mulSupport g := mulSupport_sup f g @[to_additive] lemma mulSupport_min [LinearOrder M] (f g : α → M) : mulSupport (fun x ↦ min (f x) (g x)) ⊆ mulSupport f ∪ mulSupport g := mulSupport_inf f g @[to_additive] lemma mulSupport_iSup [ConditionallyCompleteLattice M] [Nonempty ι] (f : ι → α → M) : mulSupport (fun x ↦ ⨆ i, f i x) ⊆ ⋃ i, mulSupport (f i) := by simp only [mulSupport_subset_iff', mem_iUnion, not_exists, nmem_mulSupport] intro x hx simp only [hx, ciSup_const]	@[to_additive] lemma mulSupport_iInf [ConditionallyCompleteLattice M] [Nonempty ι] (f : ι → α → M) : mulSupport (fun x ↦ ⨅ i, f i x) ⊆ ⋃ i, mulSupport (f i) := mulSupport_iSup (M := Mᵒᵈ) f end Function	Mathlib/Algebra/Order/Group/Indicator.lean	52	57
/- Copyright (c) 2024 Peter Nelson. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Peter Nelson -/ import Mathlib.Data.Matroid.Constructions import Mathlib.Data.Set.Notation /-! # Maps between matroids This file defines maps and comaps, which move a matroid on one type to a matroid on another using a function between the types. The constructions are (up to isomorphism) just combinations of restrictions and parallel extensions, so are not mathematically difficult. Because a matroid `M : Matroid α` is defined with am embedded ground set `M.E : Set α` which contains all the structure of `M`, there are several types of map and comap one could reasonably ask for; for instance, we could map `M : Matroid α` to a `Matroid β` using either a function `f : α → β`, a function `f : ↑M.E → β` or indeed a function `f : ↑M.E → ↑E` for some `E : Set β`. We attempt to give definitions that capture most reasonable use cases. `Matroid.map` and `Matroid.comap` are defined in terms of bare functions rather than functions defined on subtypes, so are often easier to work in practice than the subtype variants. In fact, the statement that `N = Matroid.map M f _` for some `f : α → β` is equivalent to the existence of an isomorphism from `M` to `N`, except in the trivial degenerate case where `M` is an empty matroid on a nonempty type and `N` is an empty matroid on an empty type. This can be simpler to use than an actual formal isomorphism, which requires subtypes. ## Main definitions In the definitions below, `M` and `N` are matroids on `α` and `β` respectively. * For `f : α → β`, `Matroid.comap N f` is the matroid on `α` with ground set `f ⁻¹' N.E` in which each `I` is independent if and only if `f` is injective on `I` and `f '' I` is independent in `N`. (For each nonloop `x` of `N`, the set `f ⁻¹' {x}` is a parallel class of `N.comap f`) * `Matroid.comapOn N f E` is the restriction of `N.comap f` to `E` for some `E : Set α`. * For an embedding `f : M.E ↪ β` defined on the subtype `↑M.E`, `Matroid.mapSetEmbedding M f` is the matroid on `β` with ground set `range f` whose independent sets are the images of those in `M`. This matroid is isomorphic to `M`. * For a function `f : α → β` and a proof `hf` that `f` is injective on `M.E`, `Matroid.map f hf` is the matroid on `β` with ground set `f '' M.E` whose independent sets are the images of those in `M`. This matroid is isomorphic to `M`, and does not depend on the values `f` takes outside `M.E`. * `Matroid.mapEmbedding f` is a version of `Matroid.map` where `f : α ↪ β` is a bundled embedding. It is defined separately because the global injectivity of `f` gives some nicer `simp` lemmas. * `Matroid.mapEquiv f` is a version of `Matroid.map` where `f : α ≃ β` is a bundled equivalence. It is defined separately because we get even nicer `simp` lemmas. * `Matroid.mapSetEquiv f` is a version of `Matroid.map` where `f : M.E ≃ E` is an equivalence on subtypes. It gives a matroid on `β` with ground set `E`. * For `X : Set α`, `Matroid.restrictSubtype M X` is the `Matroid ↥X` with ground set `univ : Set ↥X`. This matroid is isomorphic to `M ↾ X`. ## Implementation details The definition of `comap` is the only place where we need to actually define a matroid from scratch. After `comap` is defined, we can define `map` and its variants indirectly in terms of `comap`. If `f : α → β` is injective on `M.E`, the independent sets of `M.map f hf` are the images of the independent set of `M`; i.e. `(M.map f hf).Indep I ↔ ∃ I₀, M.Indep I₀ ∧ I = f '' I₀`. But if `f` is globally injective, we can phrase this more directly; indeed, `(M.map f _).Indep I ↔ M.Indep (f ⁻¹' I) ∧ I ⊆ range f`. If `f` is an equivalence we have `(M.map f _).Indep I ↔ M.Indep (f.symm '' I)`. In order that these stronger statements can be `@[simp]`, we define `mapEmbedding` and `mapEquiv` separately from `map`. ## Notes For finite matroids, both maps and comaps are a special case of a construction of Perfect [perfect1969matroid] in which a matroid structure can be transported across an arbitrary bipartite graph that may not correspond to a function at all (See [oxley2011], Theorem 11.2.12). It would have been nice to use this more general construction as a basis for the definition of both `Matroid.map` and `Matroid.comap`. Unfortunately, we can't do this, because the construction doesn't extend to infinite matroids. Specifically, if `M₁` and `M₂` are matroids on the same type `α`, and `f` is the natural function from `α ⊕ α` to `α`, then the images under `f` of the independent sets of the direct sum `M₁ ⊕ M₂` are the independent sets of a matroid if and only if the union of `M₁` and `M₂` is a matroid, and unions do not exist for some pairs of infinite matroids: see [aignerhorev2012infinite]. For this reason, `Matroid.map` requires injectivity to be well-defined in general. ## TODO * Bundled matroid isomorphisms. * Maps of finite matroids across bipartite graphs. ## References * [E. Aigner-Horev, J. Carmesin, J. Fröhlic, Infinite Matroid Union][aignerhorev2012infinite] * [H. Perfect, Independence Spaces and Combinatorial Problems][perfect1969matroid] * [J. Oxley, Matroid Theory][oxley2011] -/ assert_not_exists Field open Set Function Set.Notation namespace Matroid variable {α β : Type} {f : α → β} {E I : Set α} {M : Matroid α} {N : Matroid β} section comap /-- The pullback of a matroid on `β` by a function `f : α → β` to a matroid on `α`. Elements with the same (nonloop) image are parallel and the ground set is `f ⁻¹' M.E`. The matroids `M.comap f` and `M ↾ range f` have isomorphic simplifications; the preimage of each nonloop of `M ↾ range f` is a parallel class. -/ def comap (N : Matroid β) (f : α → β) : Matroid α := IndepMatroid.matroid <\| { E := f ⁻¹' N.E Indep := fun I ↦ N.Indep (f '' I) ∧ InjOn f I indep_empty := by simp indep_subset := fun _ _ h hIJ ↦ ⟨h.1.subset (image_subset _ hIJ), InjOn.mono hIJ h.2⟩ indep_aug := by rintro I B ⟨hI, hIinj⟩ hImax hBmax obtain ⟨I', hII', hI', hI'inj⟩ := (not_maximal_subset_iff ⟨hI, hIinj⟩).1 hImax have h₁ : ¬(N ↾ range f).IsBase (f '' I) := by refine fun hB ↦ hII'.ne ?_ have h_im := hB.eq_of_subset_indep (by simpa) (image_subset _ hII'.subset) rwa [hI'inj.image_eq_image_iff hII'.subset Subset.rfl] at h_im have h₂ : (N ↾ range f).IsBase (f '' B) := by refine Indep.isBase_of_forall_insert (by simpa using hBmax.1.1) ?_ rintro _ ⟨⟨e, heB, rfl⟩, hfe⟩ hi rw [restrict_indep_iff, ← image_insert_eq] at hi have hinj : InjOn f (insert e B) := by rw [injOn_insert (fun heB ↦ hfe (mem_image_of_mem f heB))] exact ⟨hBmax.1.2, hfe⟩ refine hBmax.not_prop_of_ssuperset (t := insert e B) (ssubset_insert ?_) ⟨hi.1, hinj⟩ exact fun heB ↦ hfe <\| mem_image_of_mem f heB obtain ⟨_, ⟨⟨e, he, rfl⟩, he'⟩, hei⟩ := Indep.exists_insert_of_not_isBase (by simpa) h₁ h₂ have heI : e ∉ I := fun heI ↦ he' (mem_image_of_mem f heI) rw [← image_insert_eq, restrict_indep_iff] at hei exact ⟨e, ⟨he, heI⟩, hei.1, (injOn_insert heI).2 ⟨hIinj, he'⟩⟩ indep_maximal := by rintro X - I ⟨hI, hIinj⟩ hIX obtain ⟨J, hJ⟩ := (N ↾ range f).existsMaximalSubsetProperty_indep (f '' X) (by simp) (f '' I) (by simpa) (image_subset _ hIX) simp only [restrict_indep_iff, image_subset_iff, maximal_subset_iff, mem_setOf_eq, and_imp, and_assoc] at hJ ⊢ obtain ⟨hIJ, hJ, hJf, hJX, hJmax⟩ := hJ obtain ⟨J₀, hIJ₀, hJ₀X, hbj⟩ := hIinj.bijOn_image.exists_extend_of_subset hIX (image_subset f hIJ) (image_subset_iff.2 <\| preimage_mono hJX) obtain rfl : f '' J₀ = J := by rw [← image_preimage_eq_of_subset hJf, hbj.image_eq] refine ⟨J₀, hIJ₀, hJ, hbj.injOn, hJ₀X, fun K hK hKinj hKX hJ₀K ↦ ?_⟩ rw [← hKinj.image_eq_image_iff hJ₀K Subset.rfl, hJmax hK (image_subset_range _ _) (image_subset f hKX) (image_subset f hJ₀K)] subset_ground := fun _ hI e heI ↦ hI.1.subset_ground ⟨e, heI, rfl⟩ } @[simp] lemma comap_indep_iff : (N.comap f).Indep I ↔ N.Indep (f '' I) ∧ InjOn f I := Iff.rfl @[simp] lemma comap_ground_eq (N : Matroid β) (f : α → β) : (N.comap f).E = f ⁻¹' N.E := rfl @[simp] lemma comap_dep_iff : (N.comap f).Dep I ↔ N.Dep (f '' I) ∨ (N.Indep (f '' I) ∧ ¬ InjOn f I) := by rw [Dep, comap_indep_iff, not_and, comap_ground_eq, Dep, image_subset_iff] refine ⟨fun ⟨hi, h⟩ ↦ ?_, ?_⟩ · rw [and_iff_left h, ← imp_iff_not_or] exact fun hI ↦ ⟨hI, hi hI⟩ rintro (⟨hI, hIE⟩ \| hI) · exact ⟨fun h ↦ (hI h).elim, hIE⟩ rw [iff_true_intro hI.1, iff_true_intro hI.2, implies_true, true_and] simpa using hI.1.subset_ground @[simp] lemma comap_id (N : Matroid β) : N.comap id = N := ext_indep rfl <\| by simp [injective_id.injOn] lemma comap_indep_iff_of_injOn (hf : InjOn f (f ⁻¹' N.E)) : (N.comap f).Indep I ↔ N.Indep (f '' I) := by rw [comap_indep_iff, and_iff_left_iff_imp] refine fun hi ↦ hf.mono <\| subset_trans ?_ (preimage_mono hi.subset_ground) apply subset_preimage_image @[simp] lemma comap_emptyOn (f : α → β) : comap (emptyOn β) f = emptyOn α := by simp [← ground_eq_empty_iff] @[simp] lemma comap_loopyOn (f : α → β) (E : Set β) : comap (loopyOn E) f = loopyOn (f ⁻¹' E) := by rw [eq_loopyOn_iff]; aesop @[simp] lemma comap_isBasis_iff {I X : Set α} : (N.comap f).IsBasis I X ↔ N.IsBasis (f '' I) (f '' X) ∧ I.InjOn f ∧ I ⊆ X := by refine ⟨fun h ↦ ?_, fun h ↦ ?_⟩ · obtain ⟨hI, hinj⟩ := comap_indep_iff.1 h.indep refine ⟨hI.isBasis_of_forall_insert (image_subset f h.subset) fun e he ↦ ?_, hinj, h.subset⟩ simp only [mem_diff, mem_image, not_exists, not_and, and_imp, forall_exists_index, forall_apply_eq_imp_iff₂] at he obtain ⟨⟨e, heX, rfl⟩, he⟩ := he have heI : e ∉ I := fun heI ↦ (he e heI rfl) replace h := h.insert_dep ⟨heX, heI⟩ simp only [comap_dep_iff, image_insert_eq, or_iff_not_imp_right, injOn_insert heI, hinj, mem_image, not_exists, not_and, true_and, not_forall, Classical.not_imp, not_not] at h exact h (fun _ ↦ he) refine Indep.isBasis_of_forall_insert ?_ h.2.2 fun e ⟨heX, heI⟩ ↦ ?_ · simp [comap_indep_iff, h.1.indep, h.2] have hIE : insert e I ⊆ (N.comap f).E := by simp_rw [comap_ground_eq, ← image_subset_iff] exact (image_subset _ (insert_subset heX h.2.2)).trans h.1.subset_ground suffices N.Indep (insert (f e) (f '' I)) → ∃ x ∈ I, f x = f e by simpa [← not_indep_iff hIE, injOn_insert heI, h.2.1, image_insert_eq] exact h.1.mem_of_insert_indep (mem_image_of_mem f heX) @[simp] lemma comap_isBase_iff {B : Set α} : (N.comap f).IsBase B ↔ N.IsBasis (f '' B) (f '' (f ⁻¹' N.E)) ∧ B.InjOn f ∧ B ⊆ f ⁻¹' N.E := by rw [← isBasis_ground_iff, comap_isBasis_iff]; rfl @[simp] lemma comap_isBasis'_iff {I X : Set α} : (N.comap f).IsBasis' I X ↔ N.IsBasis' (f '' I) (f '' X) ∧ I.InjOn f ∧ I ⊆ X := by simp only [isBasis'_iff_isBasis_inter_ground, comap_ground_eq, comap_isBasis_iff, image_inter_preimage, subset_inter_iff, ← and_assoc, and_congr_left_iff, and_iff_left_iff_imp, and_imp] exact fun h _ _ ↦ (image_subset_iff.1 h.indep.subset_ground) instance comap_finitary (N : Matroid β) [N.Finitary] (f : α → β) : (N.comap f).Finitary := by refine ⟨fun I hI ↦ ?_⟩ rw [comap_indep_iff, indep_iff_forall_finite_subset_indep] simp only [forall_subset_image_iff] refine ⟨fun J hJ hfin ↦ ?_, fun x hx y hy ↦ (hI _ (pair_subset hx hy) (by simp)).2 (by simp) (by simp)⟩ obtain ⟨J', hJ'J, hJ'⟩ := (surjOn_image f J).exists_bijOn_subset rw [← hJ'.image_eq] at hfin ⊢ exact (hI J' (hJ'J.trans hJ) (hfin.of_finite_image hJ'.injOn)).1 instance comap_rankFinite (N : Matroid β) [N.RankFinite] (f : α → β) : (N.comap f).RankFinite := by obtain ⟨B, hB⟩ := (N.comap f).exists_isBase refine hB.rankFinite_of_finite ?_ simp only [comap_isBase_iff] at hB exact (hB.1.indep.finite.of_finite_image hB.2.1) end comap section comapOn variable {E B I : Set α} /-- The pullback of a matroid on `β` by a function `f : α → β` to a matroid on `α`, restricted to a ground set `E`. The matroids `M.comapOn f E` and `M ↾ (f '' E)` have isomorphic simplifications; elements with the same nonloop image are parallel. -/ def comapOn (N : Matroid β) (E : Set α) (f : α → β) : Matroid α := (N.comap f) ↾ E lemma comapOn_preimage_eq (N : Matroid β) (f : α → β) : N.comapOn (f ⁻¹' N.E) f = N.comap f := by rw [comapOn, restrict_eq_self_iff]; rfl @[simp] lemma comapOn_indep_iff : (N.comapOn E f).Indep I ↔ (N.Indep (f '' I) ∧ InjOn f I ∧ I ⊆ E) := by simp [comapOn, and_assoc] @[simp] lemma comapOn_ground_eq : (N.comapOn E f).E = E := rfl lemma comapOn_isBase_iff : (N.comapOn E f).IsBase B ↔ N.IsBasis' (f '' B) (f '' E) ∧ B.InjOn f ∧ B ⊆ E := by rw [comapOn, isBase_restrict_iff', comap_isBasis'_iff] lemma comapOn_isBase_iff_of_surjOn (h : SurjOn f E N.E) : (N.comapOn E f).IsBase B ↔ (N.IsBase (f '' B) ∧ InjOn f B ∧ B ⊆ E) := by simp_rw [comapOn_isBase_iff, and_congr_left_iff, and_imp, isBasis'_iff_isBasis_inter_ground, inter_eq_self_of_subset_right h, isBasis_ground_iff, implies_true] lemma comapOn_isBase_iff_of_bijOn (h : BijOn f E N.E) : (N.comapOn E f).IsBase B ↔ N.IsBase (f '' B) ∧ B ⊆ E := by rw [← and_iff_left_of_imp (IsBase.subset_ground (M := N.comapOn E f) (B := B)), comapOn_ground_eq, and_congr_left_iff] suffices h' : B ⊆ E → InjOn f B from fun hB ↦ by simp [hB, comapOn_isBase_iff_of_surjOn h.surjOn, h'] exact fun hBE ↦ h.injOn.mono hBE lemma comapOn_dual_eq_of_bijOn (h : BijOn f E N.E) : (N.comapOn E f)✶ = N✶.comapOn E f := by refine ext_isBase (by simp) (fun B hB ↦ ?_) rw [comapOn_isBase_iff_of_bijOn (by simpa), dual_isBase_iff, comapOn_isBase_iff_of_bijOn h, dual_isBase_iff _, comapOn_ground_eq, and_iff_left diff_subset, and_iff_left (by simpa), h.injOn.image_diff_subset (by simpa), h.image_eq] exact (h.mapsTo.mono_left (show B ⊆ E by simpa)).image_subset instance comapOn_finitary [N.Finitary] : (N.comapOn E f).Finitary := by rw [comapOn]; infer_instance instance comapOn_rankFinite [N.RankFinite] : (N.comapOn E f).RankFinite := by rw [comapOn]; infer_instance end comapOn section mapSetEmbedding /-- Map a matroid `M` to an isomorphic copy in `β` using an embedding `M.E ↪ β`. -/ def mapSetEmbedding (M : Matroid α) (f : M.E ↪ β) : Matroid β := Matroid.ofExistsMatroid (E := range f) (Indep := fun I ↦ M.Indep ↑(f ⁻¹' I) ∧ I ⊆ range f) (hM := by classical obtain (rfl \| ⟨⟨e,he⟩⟩) := eq_emptyOn_or_nonempty M · refine ⟨emptyOn β, ?_⟩ simp only [emptyOn_ground] at f simp [range_eq_empty f, subset_empty_iff] have _ : Nonempty M.E := ⟨⟨e,he⟩⟩ have _ : Nonempty α := ⟨e⟩ refine ⟨M.comapOn (range f) (fun x ↦ ↑(invFunOn f univ x)), rfl, ?_⟩ simp_rw [comapOn_indep_iff, ← and_assoc, and_congr_left_iff, subset_range_iff_exists_image_eq] rintro _ ⟨I, rfl⟩ rw [← image_image, InjOn.invFunOn_image f.injective.injOn (subset_univ _), preimage_image_eq _ f.injective, and_iff_left_iff_imp] rintro - x hx y hy simp only [EmbeddingLike.apply_eq_iff_eq, Subtype.val_inj] exact (invFunOn_injOn_image f univ) (image_subset f (subset_univ I) hx) (image_subset f (subset_univ I) hy) ) @[simp] lemma mapSetEmbedding_ground (M : Matroid α) (f : M.E ↪ β) : (M.mapSetEmbedding f).E = range f := rfl @[simp] lemma mapSetEmbedding_indep_iff {f : M.E ↪ β} {I : Set β} : (M.mapSetEmbedding f).Indep I ↔ M.Indep ↑(f ⁻¹' I) ∧ I ⊆ range f := Iff.rfl lemma Indep.exists_eq_image_of_mapSetEmbedding {f : M.E ↪ β} {I : Set β} (hI : (M.mapSetEmbedding f).Indep I) : ∃ (I₀ : Set M.E), M.Indep I₀ ∧ I = f '' I₀ := ⟨f ⁻¹' I, hI.1, Eq.symm <\| image_preimage_eq_of_subset hI.2⟩ lemma mapSetEmbedding_indep_iff' {f : M.E ↪ β} {I : Set β} : (M.mapSetEmbedding f).Indep I ↔ ∃ (I₀ : Set M.E), M.Indep ↑I₀ ∧ I = f '' I₀ := by simp only [mapSetEmbedding_indep_iff, subset_range_iff_exists_image_eq] constructor · rintro ⟨hI, I, rfl⟩ exact ⟨I, by rwa [preimage_image_eq _ f.injective] at hI, rfl⟩ rintro ⟨I, hI, rfl⟩ rw [preimage_image_eq _ f.injective] exact ⟨hI, _, rfl⟩ end mapSetEmbedding section map /-- Given a function `f` that is injective on `M.E`, the copy of `M` in `β` whose independent sets are the images of those in `M`. If `β` is a nonempty type, then `N : Matroid β` is a map of `M` if and only if `M` and `N` are isomorphic. -/ def map (M : Matroid α) (f : α → β) (hf : InjOn f M.E) : Matroid β := Matroid.ofExistsMatroid (E := f '' M.E) (Indep := fun I ↦ ∃ I₀, M.Indep I₀ ∧ I = f '' I₀) (hM := by refine ⟨M.mapSetEmbedding ⟨_, hf.injective⟩, by simp, fun I ↦ ?_⟩ simp_rw [mapSetEmbedding_indep_iff', Embedding.coeFn_mk, restrict_apply, ← image_image f Subtype.val, Subtype.exists_set_subtype (p := fun J ↦ M.Indep J ∧ I = f '' J)] exact ⟨fun ⟨I₀, _, hI₀⟩ ↦ ⟨I₀, hI₀⟩, fun ⟨I₀, hI₀⟩ ↦ ⟨I₀, hI₀.1.subset_ground, hI₀⟩⟩) @[simp] lemma map_ground (M : Matroid α) (f : α → β) (hf) : (M.map f hf).E = f '' M.E := rfl @[simp] lemma map_indep_iff {hf} {I : Set β} : (M.map f hf).Indep I ↔ ∃ I₀, M.Indep I₀ ∧ I = f '' I₀ := Iff.rfl lemma Indep.map (hI : M.Indep I) (f : α → β) (hf) : (M.map f hf).Indep (f '' I) := map_indep_iff.2 ⟨I, hI, rfl⟩ lemma Indep.exists_bijOn_of_map {I : Set β} (hf) (hI : (M.map f hf).Indep I) : ∃ I₀, M.Indep I₀ ∧ BijOn f I₀ I := by obtain ⟨I₀, hI₀, rfl⟩ := hI exact ⟨I₀, hI₀, (hf.mono hI₀.subset_ground).bijOn_image⟩ lemma map_image_indep_iff {hf} {I : Set α} (hI : I ⊆ M.E) : (M.map f hf).Indep (f '' I) ↔ M.Indep I := by rw [map_indep_iff] refine ⟨fun ⟨J, hJ, hIJ⟩ ↦ ?_, fun h ↦ ⟨I, h, rfl⟩⟩ rw [hf.image_eq_image_iff hI hJ.subset_ground] at hIJ; rwa [hIJ] @[simp] lemma map_isBase_iff (M : Matroid α) (f : α → β) (hf) {B : Set β} : (M.map f hf).IsBase B ↔ ∃ B₀, M.IsBase B₀ ∧ B = f '' B₀ := by rw [isBase_iff_maximal_indep] refine ⟨fun h ↦ ?_, ?_⟩ · obtain ⟨B₀, hB₀, hbij⟩ := h.prop.exists_bijOn_of_map refine ⟨B₀, hB₀.isBase_of_maximal fun J hJ hB₀J ↦ ?_, hbij.image_eq.symm⟩ rw [← hf.image_eq_image_iff hB₀.subset_ground hJ.subset_ground, hbij.image_eq] exact h.eq_of_subset (hJ.map f hf) (hbij.image_eq ▸ image_subset f hB₀J) rintro ⟨B, hB, rfl⟩ rw [maximal_subset_iff] refine ⟨hB.indep.map f hf, fun I hI hBI ↦ ?_⟩ obtain ⟨I₀, hI₀, hbij⟩ := hI.exists_bijOn_of_map rw [← hbij.image_eq, hf.image_subset_image_iff hB.subset_ground hI₀.subset_ground] at hBI rw [hB.eq_of_subset_indep hI₀ hBI, hbij.image_eq] lemma IsBase.map {B : Set α} (hB : M.IsBase B) {f : α → β} (hf) : (M.map f hf).IsBase (f '' B) := by rw [map_isBase_iff]; exact ⟨B, hB, rfl⟩ lemma map_dep_iff {hf} {D : Set β} : (M.map f hf).Dep D ↔ ∃ D₀, M.Dep D₀ ∧ D = f '' D₀ := by simp only [Dep, map_indep_iff, not_exists, not_and, map_ground, subset_image_iff] constructor · rintro ⟨h, D₀, hD₀E, rfl⟩ exact ⟨D₀, ⟨fun hd ↦ h _ hd rfl, hD₀E⟩, rfl⟩ rintro ⟨D₀, ⟨hD₀, hD₀E⟩, rfl⟩ refine ⟨fun I hI h_eq ↦ ?_, ⟨_, hD₀E, rfl⟩⟩ rw [hf.image_eq_image_iff hD₀E hI.subset_ground] at h_eq subst h_eq; contradiction lemma map_image_isBase_iff {hf} {B : Set α} (hB : B ⊆ M.E) : (M.map f hf).IsBase (f '' B) ↔ M.IsBase B := by rw [map_isBase_iff] refine ⟨fun ⟨J, hJ, hIJ⟩ ↦ ?_, fun h ↦ ⟨B, h, rfl⟩⟩ rw [hf.image_eq_image_iff hB hJ.subset_ground] at hIJ; rwa [hIJ] lemma IsBasis.map {X : Set α} (hIX : M.IsBasis I X) {f : α → β} (hf) : (M.map f hf).IsBasis (f '' I) (f '' X) := by refine (hIX.indep.map f hf).isBasis_of_forall_insert (image_subset _ hIX.subset) ?_ rintro _ ⟨⟨e,he,rfl⟩, he'⟩ have hss := insert_subset (hIX.subset_ground he) hIX.indep.subset_ground rw [← not_indep_iff (by simpa [← image_insert_eq] using image_subset f hss)] simp only [map_indep_iff, not_exists, not_and] intro J hJ hins rw [← image_insert_eq, hf.image_eq_image_iff hss hJ.subset_ground] at hins obtain rfl := hins exact he' (mem_image_of_mem f (hIX.mem_of_insert_indep he hJ)) lemma map_isBasis_iff {I X : Set α} (f : α → β) (hf) (hI : I ⊆ M.E) (hX : X ⊆ M.E) : (M.map f hf).IsBasis (f '' I) (f '' X) ↔ M.IsBasis I X := by refine ⟨fun h ↦ ?_, fun h ↦ h.map hf⟩ obtain ⟨I', hI', hII'⟩ := map_indep_iff.1 h.indep rw [hf.image_eq_image_iff hI hI'.subset_ground] at hII' obtain rfl := hII' have hss := (hf.image_subset_image_iff hI hX).1 h.subset refine hI'.isBasis_of_maximal_subset hss (fun J hJ hIJ hJX ↦ ?_) have hIJ' := h.eq_of_subset_indep (hJ.map f hf) (image_subset f hIJ) (image_subset f hJX) rw [hf.image_eq_image_iff hI hJ.subset_ground] at hIJ' exact hIJ'.symm.subset lemma map_isBasis_iff' {I X : Set β} {hf} : (M.map f hf).IsBasis I X ↔ ∃ I₀ X₀, M.IsBasis I₀ X₀ ∧ I = f '' I₀ ∧ X = f '' X₀ := by refine ⟨fun h ↦ ?_, ?_⟩ · obtain ⟨I, hI, rfl⟩ := subset_image_iff.1 h.indep.subset_ground obtain ⟨X, hX, rfl⟩ := subset_image_iff.1 h.subset_ground rw [map_isBasis_iff _ _ hI hX] at h exact ⟨I, X, h, rfl, rfl⟩ rintro ⟨I, X, hIX, rfl, rfl⟩ exact hIX.map hf @[simp] lemma map_dual {hf} : (M.map f hf)✶ = M✶.map f hf := by apply ext_isBase (by simp) simp only [dual_ground, map_ground, subset_image_iff, forall_exists_index, and_imp, forall_apply_eq_imp_iff₂, dual_isBase_iff'] intro B hB simp_rw [← hf.image_diff_subset hB, map_image_isBase_iff diff_subset, map_image_isBase_iff (show B ⊆ M✶.E from hB), dual_isBase_iff hB, and_iff_left_iff_imp] exact fun _ ↦ ⟨B, hB, rfl⟩ @[simp] lemma map_emptyOn (f : α → β) : (emptyOn α).map f (by simp) = emptyOn β := by simp [← ground_eq_empty_iff] @[simp] lemma map_loopyOn (f : α → β) (hf) : (loopyOn E).map f hf = loopyOn (f '' E) := by simp [eq_loopyOn_iff] @[simp] lemma map_freeOn (f : α → β) (hf) : (freeOn E).map f hf = freeOn (f '' E) := by rw [← dual_inj]; simp @[simp] lemma map_id : M.map id (injOn_id M.E) = M := by simp [ext_iff_indep] lemma map_comap {f : α → β} (h_range : N.E ⊆ range f) (hf : InjOn f (f ⁻¹' N.E)) : (N.comap f).map f hf = N := by refine ext_indep (by simpa [image_preimage_eq_iff]) ?_ simp only [map_ground, comap_ground_eq, map_indep_iff, comap_indep_iff, forall_subset_image_iff] refine fun I hI ↦ ⟨fun ⟨I₀, ⟨hI₀, _⟩, hII₀⟩ ↦ ?_, fun h ↦ ⟨_, ⟨h, hf.mono hI⟩, rfl⟩⟩ suffices h : I₀ ⊆ f ⁻¹' N.E by rw [InjOn.image_eq_image_iff hf hI h] at hII₀; rwa [hII₀] exact (subset_preimage_image f I₀).trans <\| preimage_mono (f := f) hI₀.subset_ground lemma comap_map {f : α → β} (hf : f.Injective) : (M.map f hf.injOn).comap f = M := by simp [ext_iff_indep, preimage_image_eq _ hf, and_iff_left hf.injOn, image_eq_image hf] instance [M.Nonempty] {f : α → β} (hf) : (M.map f hf).Nonempty := ⟨by simp [M.ground_nonempty]⟩ instance [M.Finite] {f : α → β} (hf) : (M.map f hf).Finite := ⟨M.ground_finite.image f⟩ instance [M.Finitary] {f : α → β} (hf) : (M.map f hf).Finitary := by refine ⟨fun I hI ↦ ?_⟩ simp only [map_indep_iff] have h' : I ⊆ f '' M.E := by intro e he obtain ⟨I₀, hI₀, h_eq⟩ := hI {e} (by simpa) (by simp) exact image_subset f hI₀.subset_ground <\| h_eq.subset rfl obtain ⟨I₀, hI₀E, rfl⟩ := subset_image_iff.1 h' refine ⟨I₀, indep_of_forall_finite_subset_indep _ fun J₀ hJ₀I₀ hJ₀ ↦ ?_, rfl⟩ specialize hI (f '' J₀) (image_subset f hJ₀I₀) (hJ₀.image _) rwa [map_image_indep_iff (hJ₀I₀.trans hI₀E)] at hI instance [M.RankFinite] {f : α → β} (hf) : (M.map f hf).RankFinite := let ⟨_, hB⟩ := M.exists_isBase (hB.map hf).rankFinite_of_finite (hB.finite.image _) instance [M.RankPos] {f : α → β} (hf) : (M.map f hf).RankPos := let ⟨_, hB⟩ := M.exists_isBase (hB.map hf).rankPos_of_nonempty (hB.nonempty.image _) end map section mapSetEquiv /-- Map `M : Matroid α` to a `Matroid β` with ground set `E` using an equivalence `M.E ≃ E`. Defined using `Matroid.ofExistsMatroid` for better defeq. -/ def mapSetEquiv (M : Matroid α) {E : Set β} (e : M.E ≃ E) : Matroid β := Matroid.ofExistsMatroid E (fun I ↦ (M.Indep ↑(e.symm '' (E ↓∩ I)) ∧ I ⊆ E)) ⟨M.mapSetEmbedding (e.toEmbedding.trans <\| Function.Embedding.subtype _), by have hrw : ∀ I : Set β, Subtype.val ∘ ⇑e ⁻¹' I = ⇑e.symm '' E ↓∩ I := fun I ↦ by ext; simp simp [Equiv.toEmbedding, Embedding.subtype, Embedding.trans, hrw]⟩ @[simp] lemma mapSetEquiv_indep_iff (M : Matroid α) {E : Set β} (e : M.E ≃ E) {I : Set β} : (M.mapSetEquiv e).Indep I ↔ M.Indep ↑(e.symm '' (E ↓∩ I)) ∧ I ⊆ E := Iff.rfl @[simp] lemma mapSetEquiv.ground (M : Matroid α) {E : Set β} (e : M.E ≃ E) : (M.mapSetEquiv e).E = E := rfl end mapSetEquiv section mapEmbedding /-- Map `M : Matroid α` across an embedding defined on all of `α` -/ def mapEmbedding (M : Matroid α) (f : α ↪ β) : Matroid β := M.map f f.injective.injOn @[simp] lemma mapEmbedding_ground_eq (M : Matroid α) (f : α ↪ β) : (M.mapEmbedding f).E = f '' M.E := rfl @[simp] lemma mapEmbedding_indep_iff {f : α ↪ β} {I : Set β} : (M.mapEmbedding f).Indep I ↔ M.Indep (f ⁻¹' I) ∧ I ⊆ range f := by rw [mapEmbedding, map_indep_iff] refine ⟨?_, fun ⟨h,h'⟩ ↦ ⟨f ⁻¹' I, h, by rwa [eq_comm, image_preimage_eq_iff]⟩⟩ rintro ⟨I, hI, rfl⟩ rw [preimage_image_eq _ f.injective] exact ⟨hI, image_subset_range _ _⟩ lemma Indep.mapEmbedding (hI : M.Indep I) (f : α ↪ β) : (M.mapEmbedding f).Indep (f '' I) := by simpa [preimage_image_eq I f.injective] lemma IsBase.mapEmbedding {B : Set α} (hB : M.IsBase B) (f : α ↪ β) : (M.mapEmbedding f).IsBase (f '' B) := by rw [Matroid.mapEmbedding, map_isBase_iff] exact ⟨B, hB, rfl⟩ lemma IsBasis.mapEmbedding {X : Set α} (hIX : M.IsBasis I X) (f : α ↪ β) : (M.mapEmbedding f).IsBasis (f '' I) (f '' X) := by apply hIX.map @[simp] lemma mapEmbedding_isBase_iff {f : α ↪ β} {B : Set β} : (M.mapEmbedding f).IsBase B ↔ M.IsBase (f ⁻¹' B) ∧ B ⊆ range f := by rw [mapEmbedding, map_isBase_iff] refine ⟨?_, fun ⟨h,h'⟩ ↦ ⟨f ⁻¹' B, h, by rwa [eq_comm, image_preimage_eq_iff]⟩⟩ rintro ⟨B, hB, rfl⟩ rw [preimage_image_eq _ f.injective] exact ⟨hB, image_subset_range _ _⟩ @[simp] lemma mapEmbedding_isBasis_iff {f : α ↪ β} {I X : Set β} : (M.mapEmbedding f).IsBasis I X ↔ M.IsBasis (f ⁻¹' I) (f ⁻¹' X) ∧ I ⊆ X ∧ X ⊆ range f := by rw [mapEmbedding, map_isBasis_iff'] refine ⟨?_, fun ⟨hb, hIX, hX⟩ ↦ ?_⟩ · rintro ⟨I, X, hIX, rfl, rfl⟩ simp [preimage_image_eq _ f.injective, image_subset f hIX.subset, hIX] obtain ⟨X, rfl⟩ := subset_range_iff_exists_image_eq.1 hX obtain ⟨I, -, rfl⟩ := subset_image_iff.1 hIX exact ⟨I, X, by simpa [preimage_image_eq _ f.injective] using hb⟩ instance [M.Nonempty] {f : α ↪ β} : (M.mapEmbedding f).Nonempty := inferInstanceAs (M.map f f.injective.injOn).Nonempty instance [M.Finite] {f : α ↪ β} : (M.mapEmbedding f).Finite := inferInstanceAs (M.map f f.injective.injOn).Finite instance [M.Finitary] {f : α ↪ β} : (M.mapEmbedding f).Finitary := inferInstanceAs (M.map f f.injective.injOn).Finitary instance [M.RankFinite] {f : α ↪ β} : (M.mapEmbedding f).RankFinite := inferInstanceAs (M.map f f.injective.injOn).RankFinite instance [M.RankPos] {f : α ↪ β} : (M.mapEmbedding f).RankPos := inferInstanceAs (M.map f f.injective.injOn).RankPos end mapEmbedding section mapEquiv variable {f : α ≃ β} /-- Map `M : Matroid α` across an equivalence `α ≃ β` -/ def mapEquiv (M : Matroid α) (f : α ≃ β) : Matroid β := M.mapEmbedding f.toEmbedding @[simp] lemma mapEquiv_ground_eq (M : Matroid α) (f : α ≃ β) : (M.mapEquiv f).E = f '' M.E := rfl lemma mapEquiv_eq_map (f : α ≃ β) : M.mapEquiv f = M.map f f.injective.injOn := rfl @[simp] lemma mapEquiv_indep_iff {I : Set β} : (M.mapEquiv f).Indep I ↔ M.Indep (f.symm '' I) := by rw [mapEquiv_eq_map, map_indep_iff] exact ⟨by rintro ⟨I, hI, rfl⟩; simpa, fun h ↦ ⟨_, h, by simp⟩⟩ @[simp] lemma mapEquiv_dep_iff {D : Set β} : (M.mapEquiv f).Dep D ↔ M.Dep (f.symm '' D) := by rw [mapEquiv_eq_map, map_dep_iff] exact ⟨by rintro ⟨I, hI, rfl⟩; simpa, fun h ↦ ⟨_, h, by simp⟩⟩ @[simp] lemma mapEquiv_isBase_iff {B : Set β} : (M.mapEquiv f).IsBase B ↔ M.IsBase (f.symm '' B) := by rw [mapEquiv_eq_map, map_isBase_iff] exact ⟨by rintro ⟨I, hI, rfl⟩; simpa, fun h ↦ ⟨_, h, by simp⟩⟩ @[simp] lemma mapEquiv_isBasis_iff {α β : Type} {M : Matroid α} (f : α ≃ β) {I X : Set β} : (M.mapEquiv f).IsBasis I X ↔ M.IsBasis (f.symm '' I) (f.symm '' X) := by rw [mapEquiv_eq_map, map_isBasis_iff'] refine ⟨fun h ↦ ?_, fun h ↦ ⟨_, _, h, by simp, by simp⟩⟩ obtain ⟨I, X, hIX, rfl, rfl⟩ := h simpa instance [M.Nonempty] {f : α ≃ β} : (M.mapEquiv f).Nonempty := inferInstanceAs (M.map f f.injective.injOn).Nonempty instance [M.Finite] {f : α ≃ β} : (M.mapEquiv f).Finite := inferInstanceAs (M.map f f.injective.injOn).Finite instance [M.Finitary] {f : α ≃ β} : (M.mapEquiv f).Finitary := inferInstanceAs (M.map f f.injective.injOn).Finitary instance [M.RankFinite] {f : α ≃ β} : (M.mapEquiv f).RankFinite := inferInstanceAs (M.map f f.injective.injOn).RankFinite instance [M.RankPos] {f : α ≃ β} : (M.mapEquiv f).RankPos :=	inferInstanceAs (M.map f f.injective.injOn).RankPos end mapEquiv section restrictSubtype	Mathlib/Data/Matroid/Map.lean	629	633
/- 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.Basic import Mathlib.Topology.Order.ProjIcc /-! # Inverse trigonometric functions. See also `Analysis.SpecialFunctions.Trigonometric.Arctan` for the inverse tan function. (This is delayed as it is easier to set up after developing complex trigonometric functions.) Basic inequalities on trigonometric functions. -/ noncomputable section open Topology Filter Set Filter Real namespace Real variable {x y : ℝ} /-- Inverse of the `sin` function, returns values in the range `-π / 2 ≤ arcsin x ≤ π / 2`. It defaults to `-π / 2` on `(-∞, -1)` and to `π / 2` to `(1, ∞)`. -/ @[pp_nodot] noncomputable def arcsin : ℝ → ℝ := Subtype.val ∘ IccExtend (neg_le_self zero_le_one) sinOrderIso.symm theorem arcsin_mem_Icc (x : ℝ) : arcsin x ∈ Icc (-(π / 2)) (π / 2) := Subtype.coe_prop _ @[simp] theorem range_arcsin : range arcsin = Icc (-(π / 2)) (π / 2) := by rw [arcsin, range_comp Subtype.val] simp [Icc] theorem arcsin_le_pi_div_two (x : ℝ) : arcsin x ≤ π / 2 := (arcsin_mem_Icc x).2 theorem neg_pi_div_two_le_arcsin (x : ℝ) : -(π / 2) ≤ arcsin x := (arcsin_mem_Icc x).1 theorem arcsin_projIcc (x : ℝ) : arcsin (projIcc (-1) 1 (neg_le_self zero_le_one) x) = arcsin x := by rw [arcsin, Function.comp_apply, IccExtend_val, Function.comp_apply, IccExtend, Function.comp_apply] theorem sin_arcsin' {x : ℝ} (hx : x ∈ Icc (-1 : ℝ) 1) : sin (arcsin x) = x := by simpa [arcsin, IccExtend_of_mem _ _ hx, -OrderIso.apply_symm_apply] using Subtype.ext_iff.1 (sinOrderIso.apply_symm_apply ⟨x, hx⟩) theorem sin_arcsin {x : ℝ} (hx₁ : -1 ≤ x) (hx₂ : x ≤ 1) : sin (arcsin x) = x := sin_arcsin' ⟨hx₁, hx₂⟩	theorem arcsin_sin' {x : ℝ} (hx : x ∈ Icc (-(π / 2)) (π / 2)) : arcsin (sin x) = x := injOn_sin (arcsin_mem_Icc _) hx <\| by rw [sin_arcsin (neg_one_le_sin _) (sin_le_one _)] theorem arcsin_sin {x : ℝ} (hx₁ : -(π / 2) ≤ x) (hx₂ : x ≤ π / 2) : arcsin (sin x) = x :=	Mathlib/Analysis/SpecialFunctions/Trigonometric/Inverse.lean	58	61
/- 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, Floris van Doorn, Yury Kudryashov, Neil Strickland -/ import Mathlib.Algebra.Ring.InjSurj import Mathlib.Algebra.Group.Units.Hom import Mathlib.Algebra.Ring.Hom.Defs /-! # Units in semirings and rings -/ universe u v w x variable {α : Type u} {β : Type v} {R : Type x} open Function namespace Units section HasDistribNeg variable [Monoid α] [HasDistribNeg α] /-- Each element of the group of units of a ring has an additive inverse. -/ instance : Neg αˣ := ⟨fun u => ⟨-↑u, -↑u⁻¹, by simp, by simp⟩⟩ /-- Representing an element of a ring's unit group as an element of the ring commutes with mapping this element to its additive inverse. -/ @[simp, norm_cast] protected theorem val_neg (u : αˣ) : (↑(-u) : α) = -u := rfl @[simp, norm_cast] protected theorem coe_neg_one : ((-1 : αˣ) : α) = -1 := rfl instance : HasDistribNeg αˣ := Units.ext.hasDistribNeg _ Units.val_neg Units.val_mul @[field_simps] theorem neg_divp (a : α) (u : αˣ) : -(a /ₚ u) = -a /ₚ u := by simp only [divp, neg_mul] end HasDistribNeg section Ring variable [Ring α] -- Needs to have higher simp priority than divp_add_divp. 1000 is the default priority. @[field_simps 1010] theorem divp_add_divp_same (a b : α) (u : αˣ) : a /ₚ u + b /ₚ u = (a + b) /ₚ u := by simp only [divp, add_mul] -- Needs to have higher simp priority than divp_sub_divp. 1000 is the default priority. @[field_simps 1010] theorem divp_sub_divp_same (a b : α) (u : αˣ) : a /ₚ u - b /ₚ u = (a - b) /ₚ u := by rw [sub_eq_add_neg, sub_eq_add_neg, neg_divp, divp_add_divp_same] @[field_simps] theorem add_divp (a b : α) (u : αˣ) : a + b /ₚ u = (a * u + b) /ₚ u := by simp only [divp, add_mul, Units.mul_inv_cancel_right] @[field_simps] theorem sub_divp (a b : α) (u : αˣ) : a - b /ₚ u = (a * u - b) /ₚ u := by simp only [divp, sub_mul, Units.mul_inv_cancel_right] @[field_simps] theorem divp_add (a b : α) (u : αˣ) : a /ₚ u + b = (a + b * u) /ₚ u := by simp only [divp, add_mul, Units.mul_inv_cancel_right] @[field_simps] theorem divp_sub (a b : α) (u : αˣ) : a /ₚ u - b = (a - b * u) /ₚ u := by simp only [divp, sub_mul, sub_right_inj] rw [mul_assoc, Units.mul_inv, mul_one] @[simp] protected theorem map_neg {F : Type} [Ring β] [FunLike F α β] [RingHomClass F α β] (f : F) (u : αˣ) : map (f : α → β) (-u) = -map (f : α →* β) u := ext (by simp only [coe_map, Units.val_neg, MonoidHom.coe_coe, map_neg]) protected theorem map_neg_one {F : Type*} [Ring β] [FunLike F α β] [RingHomClass F α β]	(f : F) : map (f : α →* β) (-1) = -1 := by simp only [Units.map_neg, map_one]	Mathlib/Algebra/Ring/Units.lean	87	89
/- Copyright (c) 2023 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Algebra.Group.PUnit import Mathlib.Algebra.Group.Subgroup.Ker import Mathlib.Algebra.Group.Submonoid.Membership import Mathlib.GroupTheory.Congruence.Basic /-! # Coproduct (free product) of two monoids or groups In this file we define `Monoid.Coprod M N` (notation: `M ∗ N`) to be the coproduct (a.k.a. free product) of two monoids. The same type is used for the coproduct of two monoids and for the coproduct of two groups. The coproduct `M ∗ N` has the following universal property: for any monoid `P` and homomorphisms `f : M →* P`, `g : N →* P`, there exists a unique homomorphism `fg : M ∗ N →* P` such that `fg ∘ Monoid.Coprod.inl = f` and `fg ∘ Monoid.Coprod.inr = g`, where `Monoid.Coprod.inl : M →* M ∗ N` and `Monoid.Coprod.inr : N →* M ∗ N` are canonical embeddings. This homomorphism `fg` is given by `Monoid.Coprod.lift f g`. We also define some homomorphisms and isomorphisms about `M ∗ N`, and provide additive versions of all definitions and theorems. ## Main definitions ### Types * `Monoid.Coprod M N` (a.k.a. `M ∗ N`): the free product (a.k.a. coproduct) of two monoids `M` and `N`. * `AddMonoid.Coprod M N` (no notation): the additive version of `Monoid.Coprod`. In other sections, we only list multiplicative definitions. ### Instances * `MulOneClass`, `Monoid`, and `Group` structures on the coproduct `M ∗ N`. ### Monoid homomorphisms * `Monoid.Coprod.mk`: the projection `FreeMonoid (M ⊕ N) →* M ∗ N`. * `Monoid.Coprod.inl`, `Monoid.Coprod.inr`: canonical embeddings `M →* M ∗ N` and `N →* M ∗ N`. * `Monoid.Coprod.lift`: construct a monoid homomorphism `M ∗ N →* P` from homomorphisms `M →* P` and `N →* P`; see also `Monoid.Coprod.liftEquiv`. * `Monoid.Coprod.clift`: a constructor for homomorphisms `M ∗ N →* P` that allows the user to control the computational behavior. * `Monoid.Coprod.map`: combine two homomorphisms `f : M →* N` and `g : M' →* N'` into `M ∗ M' →* N ∗ N'`. * `Monoid.Coprod.swap`: the natural homomorphism `M ∗ N →* N ∗ M`. * `Monoid.Coprod.fst`, `Monoid.Coprod.snd`, and `Monoid.Coprod.toProd`: natural projections `M ∗ N →* M`, `M ∗ N →* N`, and `M ∗ N →* M × N`. ### Monoid isomorphisms * `MulEquiv.coprodCongr`: a `MulEquiv` version of `Monoid.Coprod.map`. * `MulEquiv.coprodComm`: a `MulEquiv` version of `Monoid.Coprod.swap`. * `MulEquiv.coprodAssoc`: associativity of the coproduct. * `MulEquiv.coprodPUnit`, `MulEquiv.punitCoprod`: free product by `PUnit` on the left or on the right is isomorphic to the original monoid. ## Main results The universal property of the coproduct is given by the definition `Monoid.Coprod.lift` and the lemma `Monoid.Coprod.lift_unique`. We also prove a slightly more general extensionality lemma `Monoid.Coprod.hom_ext` for homomorphisms `M ∗ N →* P` and prove lots of basic lemmas like `Monoid.Coprod.fst_comp_inl`. ## Implementation details The definition of the coproduct of an indexed family of monoids is formalized in `Monoid.CoprodI`. While mathematically `M ∗ N` is a particular case of the coproduct of an indexed family of monoids, it is easier to build API from scratch instead of using something like ``` def Monoid.Coprod M N := Monoid.CoprodI ![M, N] ``` or ``` def Monoid.Coprod M N := Monoid.CoprodI (fun b : Bool => cond b M N) ``` There are several reasons to build an API from scratch. - API about `Con` makes it easy to define the required type and prove the universal property, so there is little overhead compared to transferring API from `Monoid.CoprodI`. - If `M` and `N` live in different universes, then the definition has to add `ULift`s; this makes it harder to transfer API and definitions. - As of now, we have no way to automatically build an instance of `(k : Fin 2) → Monoid (![M, N] k)` from `[Monoid M]` and `[Monoid N]`, not even speaking about more advanced typeclass assumptions that involve both `M` and `N`. - Using a list of `M ⊕ N` instead of, e.g., a list of `Σ k : Fin 2, ![M, N] k` as the underlying type makes it possible to write computationally effective code (though this point is not tested yet). ## TODO - Prove `Monoid.CoprodI (f : Fin 2 → Type) ≃ f 0 ∗ f 1` and `Monoid.CoprodI (f : Bool → Type) ≃ f false ∗ f true`. ## Tags group, monoid, coproduct, free product -/ assert_not_exists MonoidWithZero open FreeMonoid Function List Set namespace Monoid /-- The minimal congruence relation `c` on `FreeMonoid (M ⊕ N)` such that `FreeMonoid.of ∘ Sum.inl` and `FreeMonoid.of ∘ Sum.inr` are monoid homomorphisms to the quotient by `c`. -/ @[to_additive "The minimal additive congruence relation `c` on `FreeAddMonoid (M ⊕ N)` such that `FreeAddMonoid.of ∘ Sum.inl` and `FreeAddMonoid.of ∘ Sum.inr` are additive monoid homomorphisms to the quotient by `c`."] def coprodCon (M N : Type) [MulOneClass M] [MulOneClass N] : Con (FreeMonoid (M ⊕ N)) := sInf {c \| (∀ x y : M, c (of (Sum.inl (x y))) (of (Sum.inl x) * of (Sum.inl y))) ∧ (∀ x y : N, c (of (Sum.inr (x * y))) (of (Sum.inr x) * of (Sum.inr y))) ∧ c (of <\| Sum.inl 1) 1 ∧ c (of <\| Sum.inr 1) 1} /-- Coproduct of two monoids or groups. -/ @[to_additive "Coproduct of two additive monoids or groups."] def Coprod (M N : Type) [MulOneClass M] [MulOneClass N] := (coprodCon M N).Quotient namespace Coprod @[inherit_doc] scoped infix:30 " ∗ " => Coprod section MulOneClass variable {M N M' N' P : Type} [MulOneClass M] [MulOneClass N] [MulOneClass M'] [MulOneClass N'] [MulOneClass P] @[to_additive] protected instance : MulOneClass (M ∗ N) := Con.mulOneClass _ /-- The natural projection `FreeMonoid (M ⊕ N) →* M ∗ N`. -/ @[to_additive "The natural projection `FreeAddMonoid (M ⊕ N) →+ AddMonoid.Coprod M N`."] def mk : FreeMonoid (M ⊕ N) →* M ∗ N := Con.mk' _ @[to_additive (attr := simp)] theorem con_ker_mk : Con.ker mk = coprodCon M N := Con.mk'_ker _ @[to_additive] theorem mk_surjective : Surjective (@mk M N _ _) := Quot.mk_surjective @[to_additive (attr := simp)] theorem mrange_mk : MonoidHom.mrange (@mk M N _ _) = ⊤ := Con.mrange_mk' @[to_additive] theorem mk_eq_mk {w₁ w₂ : FreeMonoid (M ⊕ N)} : mk w₁ = mk w₂ ↔ coprodCon M N w₁ w₂ := Con.eq _ /-- The natural embedding `M →* M ∗ N`. -/ @[to_additive "The natural embedding `M →+ AddMonoid.Coprod M N`."] def inl : M →* M ∗ N where toFun := fun x => mk (of (.inl x)) map_one' := mk_eq_mk.2 fun _c hc => hc.2.2.1 map_mul' := fun x y => mk_eq_mk.2 fun _c hc => hc.1 x y /-- The natural embedding `N →* M ∗ N`. -/ @[to_additive "The natural embedding `N →+ AddMonoid.Coprod M N`."] def inr : N →* M ∗ N where toFun := fun x => mk (of (.inr x)) map_one' := mk_eq_mk.2 fun _c hc => hc.2.2.2 map_mul' := fun x y => mk_eq_mk.2 fun _c hc => hc.2.1 x y @[to_additive (attr := simp)] theorem mk_of_inl (x : M) : (mk (of (.inl x)) : M ∗ N) = inl x := rfl @[to_additive (attr := simp)] theorem mk_of_inr (x : N) : (mk (of (.inr x)) : M ∗ N) = inr x := rfl @[to_additive (attr := elab_as_elim)] theorem induction_on' {C : M ∗ N → Prop} (m : M ∗ N) (one : C 1) (inl_mul : ∀ m x, C x → C (inl m * x)) (inr_mul : ∀ n x, C x → C (inr n * x)) : C m := by rcases mk_surjective m with ⟨x, rfl⟩ induction x using FreeMonoid.inductionOn' with \| one => exact one \| mul_of x xs ih => cases x with \| inl m => simpa using inl_mul m _ ih \| inr n => simpa using inr_mul n _ ih @[to_additive (attr := elab_as_elim)] theorem induction_on {C : M ∗ N → Prop} (m : M ∗ N) (inl : ∀ m, C (inl m)) (inr : ∀ n, C (inr n)) (mul : ∀ x y, C x → C y → C (x * y)) : C m := induction_on' m (by simpa using inl 1) (fun _ _ ↦ mul _ _ (inl _)) fun _ _ ↦ mul _ _ (inr _) /-- Lift a monoid homomorphism `FreeMonoid (M ⊕ N) →* P` satisfying additional properties to `M ∗ N →* P`. In many cases, `Coprod.lift` is more convenient. Compared to `Coprod.lift`, this definition allows a user to provide a custom computational behavior. Also, it only needs `MulOneclass` assumptions while `Coprod.lift` needs a `Monoid` structure. -/ @[to_additive "Lift an additive monoid homomorphism `FreeAddMonoid (M ⊕ N) →+ P` satisfying additional properties to `AddMonoid.Coprod M N →+ P`. Compared to `AddMonoid.Coprod.lift`, this definition allows a user to provide a custom computational behavior. Also, it only needs `AddZeroclass` assumptions while `AddMonoid.Coprod.lift` needs an `AddMonoid` structure. "] def clift (f : FreeMonoid (M ⊕ N) →* P) (hM₁ : f (of (.inl 1)) = 1) (hN₁ : f (of (.inr 1)) = 1) (hM : ∀ x y, f (of (.inl (x * y))) = f (of (.inl x) * of (.inl y))) (hN : ∀ x y, f (of (.inr (x * y))) = f (of (.inr x) * of (.inr y))) : M ∗ N →* P := Con.lift _ f <\| sInf_le ⟨hM, hN, hM₁.trans (map_one f).symm, hN₁.trans (map_one f).symm⟩ @[to_additive (attr := simp)] theorem clift_apply_inl (f : FreeMonoid (M ⊕ N) →* P) (hM₁ hN₁ hM hN) (x : M) : clift f hM₁ hN₁ hM hN (inl x) = f (of (.inl x)) := rfl @[to_additive (attr := simp)] theorem clift_apply_inr (f : FreeMonoid (M ⊕ N) →* P) (hM₁ hN₁ hM hN) (x : N) : clift f hM₁ hN₁ hM hN (inr x) = f (of (.inr x)) := rfl @[to_additive (attr := simp)] theorem clift_apply_mk (f : FreeMonoid (M ⊕ N) →* P) (hM₁ hN₁ hM hN w) : clift f hM₁ hN₁ hM hN (mk w) = f w := rfl @[to_additive (attr := simp)] theorem clift_comp_mk (f : FreeMonoid (M ⊕ N) →* P) (hM₁ hN₁ hM hN) : (clift f hM₁ hN₁ hM hN).comp mk = f := DFunLike.ext' rfl @[to_additive (attr := simp)] theorem mclosure_range_inl_union_inr : Submonoid.closure (range (inl : M →* M ∗ N) ∪ range (inr : N →* M ∗ N)) = ⊤ := by rw [← mrange_mk, MonoidHom.mrange_eq_map, ← closure_range_of, MonoidHom.map_mclosure, ← range_comp, Sum.range_eq]; rfl @[to_additive (attr := simp)] theorem mrange_inl_sup_mrange_inr : MonoidHom.mrange (inl : M →* M ∗ N) ⊔ MonoidHom.mrange (inr : N →* M ∗ N) = ⊤ := by rw [← mclosure_range_inl_union_inr, Submonoid.closure_union, ← MonoidHom.coe_mrange, ← MonoidHom.coe_mrange, Submonoid.closure_eq, Submonoid.closure_eq] @[to_additive] theorem codisjoint_mrange_inl_mrange_inr : Codisjoint (MonoidHom.mrange (inl : M →* M ∗ N)) (MonoidHom.mrange inr) := codisjoint_iff.2 mrange_inl_sup_mrange_inr @[to_additive] theorem mrange_eq (f : M ∗ N →* P) : MonoidHom.mrange f = MonoidHom.mrange (f.comp inl) ⊔ MonoidHom.mrange (f.comp inr) := by rw [MonoidHom.mrange_eq_map, ← mrange_inl_sup_mrange_inr, Submonoid.map_sup, MonoidHom.map_mrange, MonoidHom.map_mrange] /-- Extensionality lemma for monoid homomorphisms `M ∗ N →* P`. If two homomorphisms agree on the ranges of `Monoid.Coprod.inl` and `Monoid.Coprod.inr`, then they are equal. -/ @[to_additive (attr := ext 1100) "Extensionality lemma for additive monoid homomorphisms `AddMonoid.Coprod M N →+ P`. If two homomorphisms agree on the ranges of `AddMonoid.Coprod.inl` and `AddMonoid.Coprod.inr`, then they are equal."] theorem hom_ext {f g : M ∗ N →* P} (h₁ : f.comp inl = g.comp inl) (h₂ : f.comp inr = g.comp inr) : f = g := MonoidHom.eq_of_eqOn_denseM mclosure_range_inl_union_inr <\| eqOn_union.2 ⟨eqOn_range.2 <\| DFunLike.ext'_iff.1 h₁, eqOn_range.2 <\| DFunLike.ext'_iff.1 h₂⟩ @[to_additive (attr := simp)] theorem clift_mk : clift (mk : FreeMonoid (M ⊕ N) →* M ∗ N) (map_one inl) (map_one inr) (map_mul inl) (map_mul inr) = .id _ := hom_ext rfl rfl /-- Map `M ∗ N` to `M' ∗ N'` by applying `Sum.map f g` to each element of the underlying list. -/ @[to_additive "Map `AddMonoid.Coprod M N` to `AddMonoid.Coprod M' N'` by applying `Sum.map f g` to each element of the underlying list."] def map (f : M →* M') (g : N →* N') : M ∗ N →* M' ∗ N' := clift (mk.comp <\| FreeMonoid.map <\| Sum.map f g) (by simp only [MonoidHom.comp_apply, map_of, Sum.map_inl, map_one, mk_of_inl]) (by simp only [MonoidHom.comp_apply, map_of, Sum.map_inr, map_one, mk_of_inr]) (fun x y => by simp only [MonoidHom.comp_apply, map_of, Sum.map_inl, map_mul, mk_of_inl]) fun x y => by simp only [MonoidHom.comp_apply, map_of, Sum.map_inr, map_mul, mk_of_inr] @[to_additive (attr := simp)] theorem map_mk_ofList (f : M →* M') (g : N →* N') (l : List (M ⊕ N)) : map f g (mk (ofList l)) = mk (ofList (l.map (Sum.map f g))) := rfl @[to_additive (attr := simp)] theorem map_apply_inl (f : M →* M') (g : N →* N') (x : M) : map f g (inl x) = inl (f x) := rfl @[to_additive (attr := simp)] theorem map_apply_inr (f : M →* M') (g : N →* N') (x : N) : map f g (inr x) = inr (g x) := rfl @[to_additive (attr := simp)] theorem map_comp_inl (f : M →* M') (g : N →* N') : (map f g).comp inl = inl.comp f := rfl @[to_additive (attr := simp)] theorem map_comp_inr (f : M →* M') (g : N →* N') : (map f g).comp inr = inr.comp g := rfl @[to_additive (attr := simp)] theorem map_id_id : map (.id M) (.id N) = .id (M ∗ N) := hom_ext rfl rfl @[to_additive] theorem map_comp_map {M'' N''} [MulOneClass M''] [MulOneClass N''] (f' : M' →* M'') (g' : N' →* N'') (f : M →* M') (g : N →* N') : (map f' g').comp (map f g) = map (f'.comp f) (g'.comp g) := hom_ext rfl rfl @[to_additive] theorem map_map {M'' N''} [MulOneClass M''] [MulOneClass N''] (f' : M' →* M'') (g' : N' →* N'') (f : M →* M') (g : N →* N') (x : M ∗ N) : map f' g' (map f g x) = map (f'.comp f) (g'.comp g) x := DFunLike.congr_fun (map_comp_map f' g' f g) x variable (M N) /-- Map `M ∗ N` to `N ∗ M` by applying `Sum.swap` to each element of the underlying list. See also `MulEquiv.coprodComm` for a `MulEquiv` version. -/ @[to_additive "Map `AddMonoid.Coprod M N` to `AddMonoid.Coprod N M` by applying `Sum.swap` to each element of the underlying list. See also `AddEquiv.coprodComm` for an `AddEquiv` version."] def swap : M ∗ N →* N ∗ M := clift (mk.comp <\| FreeMonoid.map Sum.swap) (by simp only [MonoidHom.comp_apply, map_of, Sum.swap_inl, mk_of_inr, map_one]) (by simp only [MonoidHom.comp_apply, map_of, Sum.swap_inr, mk_of_inl, map_one]) (fun x y => by simp only [MonoidHom.comp_apply, map_of, Sum.swap_inl, mk_of_inr, map_mul]) (fun x y => by simp only [MonoidHom.comp_apply, map_of, Sum.swap_inr, mk_of_inl, map_mul]) @[to_additive (attr := simp)] theorem swap_comp_swap : (swap M N).comp (swap N M) = .id _ := hom_ext rfl rfl variable {M N} @[to_additive (attr := simp)] theorem swap_swap (x : M ∗ N) : swap N M (swap M N x) = x := DFunLike.congr_fun (swap_comp_swap _ _) x @[to_additive] theorem swap_comp_map (f : M →* M') (g : N →* N') : (swap M' N').comp (map f g) = (map g f).comp (swap M N) := hom_ext rfl rfl @[to_additive] theorem swap_map (f : M →* M') (g : N →* N') (x : M ∗ N) : swap M' N' (map f g x) = map g f (swap M N x) := DFunLike.congr_fun (swap_comp_map f g) x @[to_additive (attr := simp)] theorem swap_comp_inl : (swap M N).comp inl = inr := rfl @[to_additive (attr := simp)] theorem swap_inl (x : M) : swap M N (inl x) = inr x := rfl @[to_additive (attr := simp)] theorem swap_comp_inr : (swap M N).comp inr = inl := rfl @[to_additive (attr := simp)] theorem swap_inr (x : N) : swap M N (inr x) = inl x := rfl @[to_additive] theorem swap_injective : Injective (swap M N) := LeftInverse.injective swap_swap @[to_additive (attr := simp)] theorem swap_inj {x y : M ∗ N} : swap M N x = swap M N y ↔ x = y := swap_injective.eq_iff @[to_additive (attr := simp)] theorem swap_eq_one {x : M ∗ N} : swap M N x = 1 ↔ x = 1 := swap_injective.eq_iff' (map_one _) @[to_additive] theorem swap_surjective : Surjective (swap M N) := LeftInverse.surjective swap_swap @[to_additive] theorem swap_bijective : Bijective (swap M N) := ⟨swap_injective, swap_surjective⟩ @[to_additive (attr := simp)] theorem mker_swap : MonoidHom.mker (swap M N) = ⊥ := Submonoid.ext fun _ ↦ swap_eq_one @[to_additive (attr := simp)] theorem mrange_swap : MonoidHom.mrange (swap M N) = ⊤ := MonoidHom.mrange_eq_top_of_surjective _ swap_surjective end MulOneClass section Lift variable {M N P : Type} [MulOneClass M] [MulOneClass N] [Monoid P] /-- Lift a pair of monoid homomorphisms `f : M → P`, `g : N →* P` to a monoid homomorphism `M ∗ N →* P`. See also `Coprod.clift` for a version that allows custom computational behavior and works for a `MulOneClass` codomain. -/ @[to_additive "Lift a pair of additive monoid homomorphisms `f : M →+ P`, `g : N →+ P` to an additive monoid homomorphism `AddMonoid.Coprod M N →+ P`. See also `AddMonoid.Coprod.clift` for a version that allows custom computational behavior and works for an `AddZeroClass` codomain."] def lift (f : M →* P) (g : N →* P) : (M ∗ N) →* P := clift (FreeMonoid.lift <\| Sum.elim f g) (map_one f) (map_one g) (map_mul f) (map_mul g) @[to_additive (attr := simp)] theorem lift_apply_mk (f : M →* P) (g : N →* P) (x : FreeMonoid (M ⊕ N)) : lift f g (mk x) = FreeMonoid.lift (Sum.elim f g) x := rfl @[to_additive (attr := simp)] theorem lift_apply_inl (f : M →* P) (g : N →* P) (x : M) : lift f g (inl x) = f x := rfl @[to_additive] theorem lift_unique {f : M →* P} {g : N →* P} {fg : M ∗ N →* P} (h₁ : fg.comp inl = f) (h₂ : fg.comp inr = g) : fg = lift f g := hom_ext h₁ h₂ @[to_additive (attr := simp)] theorem lift_comp_inl (f : M →* P) (g : N →* P) : (lift f g).comp inl = f := rfl @[to_additive (attr := simp)] theorem lift_apply_inr (f : M →* P) (g : N →* P) (x : N) : lift f g (inr x) = g x := rfl @[to_additive (attr := simp)] theorem lift_comp_inr (f : M →* P) (g : N →* P) : (lift f g).comp inr = g := rfl @[to_additive (attr := simp)] theorem lift_comp_swap (f : M →* P) (g : N →* P) : (lift f g).comp (swap N M) = lift g f := hom_ext rfl rfl @[to_additive (attr := simp)] theorem lift_swap (f : M →* P) (g : N →* P) (x : N ∗ M) : lift f g (swap N M x) = lift g f x := DFunLike.congr_fun (lift_comp_swap f g) x @[to_additive] theorem comp_lift {P' : Type} [Monoid P'] (f : P → P') (g₁ : M →* P) (g₂ : N →* P) : f.comp (lift g₁ g₂) = lift (f.comp g₁) (f.comp g₂) := hom_ext (by rw [MonoidHom.comp_assoc, lift_comp_inl, lift_comp_inl]) <\| by rw [MonoidHom.comp_assoc, lift_comp_inr, lift_comp_inr] /-- `Coprod.lift` as an equivalence. -/ @[to_additive "`AddMonoid.Coprod.lift` as an equivalence."] def liftEquiv : (M →* P) × (N →* P) ≃ (M ∗ N →* P) where toFun fg := lift fg.1 fg.2 invFun f := (f.comp inl, f.comp inr) left_inv _ := rfl right_inv _ := Eq.symm <\| lift_unique rfl rfl @[to_additive (attr := simp)] theorem mrange_lift (f : M →* P) (g : N →* P) : MonoidHom.mrange (lift f g) = MonoidHom.mrange f ⊔ MonoidHom.mrange g := by simp [mrange_eq] end Lift section ToProd variable {M N : Type} [Monoid M] [Monoid N] @[to_additive] instance : Monoid (M ∗ N) := { mul_assoc := (Con.monoid _).mul_assoc one_mul := (Con.monoid _).one_mul mul_one := (Con.monoid _).mul_one } /-- The natural projection `M ∗ N → M`. -/ @[to_additive "The natural projection `AddMonoid.Coprod M N →+ M`."] def fst : M ∗ N →* M := lift (.id M) 1 /-- The natural projection `M ∗ N →* N`. -/ @[to_additive "The natural projection `AddMonoid.Coprod M N →+ N`."] def snd : M ∗ N →* N := lift 1 (.id N) /-- The natural projection `M ∗ N →* M × N`. -/ @[to_additive toProd "The natural projection `AddMonoid.Coprod M N →+ M × N`."] def toProd : M ∗ N →* M × N := lift (.inl _ _) (.inr _ _) @[deprecated (since := "2025-03-11")] alias _root_.AddMonoid.Coprod.toSum := AddMonoid.Coprod.toProd @[to_additive (attr := simp)] theorem fst_comp_inl : (fst : M ∗ N →* M).comp inl = .id _ := rfl @[to_additive (attr := simp)] theorem fst_apply_inl (x : M) : fst (inl x : M ∗ N) = x := rfl @[to_additive (attr := simp)] theorem fst_comp_inr : (fst : M ∗ N →* M).comp inr = 1 := rfl @[to_additive (attr := simp)] theorem fst_apply_inr (x : N) : fst (inr x : M ∗ N) = 1 := rfl @[to_additive (attr := simp)] theorem snd_comp_inl : (snd : M ∗ N →* N).comp inl = 1 := rfl @[to_additive (attr := simp)] theorem snd_apply_inl (x : M) : snd (inl x : M ∗ N) = 1 := rfl @[to_additive (attr := simp)] theorem snd_comp_inr : (snd : M ∗ N →* N).comp inr = .id _ := rfl @[to_additive (attr := simp)] theorem snd_apply_inr (x : N) : snd (inr x : M ∗ N) = x := rfl @[to_additive (attr := simp) toProd_comp_inl] theorem toProd_comp_inl : (toProd : M ∗ N →* M × N).comp inl = .inl _ _ := rfl @[deprecated (since := "2025-03-11")] alias _root_.AddMonoid.Coprod.toSum_comp_inl := AddMonoid.Coprod.toProd_comp_inl @[to_additive (attr := simp) toProd_comp_inr] theorem toProd_comp_inr : (toProd : M ∗ N →* M × N).comp inr = .inr _ _ := rfl @[deprecated (since := "2025-03-11")] alias _root_.AddMonoid.Coprod.toSum_comp_inr := AddMonoid.Coprod.toProd_comp_inr	@[to_additive (attr := simp) toProd_apply_inl]	Mathlib/GroupTheory/Coprod/Basic.lean	508	509
/- 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) : x ∈ thickening δ E ↔ infDist x E < δ := lt_ofReal_iff_toReal_lt (infEdist_ne_top h) /-- A point in a metric space belongs to the (open) `δ`-thickening of a subset `E` if and only if it is at distance less than `δ` from some point of `E`. -/ theorem mem_thickening_iff {E : Set X} {x : X} : x ∈ thickening δ E ↔ ∃ z ∈ E, dist x z < δ := by have key_iff : ∀ z : X, edist x z < ENNReal.ofReal δ ↔ dist x z < δ := fun z ↦ by rw [dist_edist, lt_ofReal_iff_toReal_lt (edist_ne_top _ _)] simp_rw [mem_thickening_iff_exists_edist_lt, key_iff] @[simp] theorem thickening_singleton (δ : ℝ) (x : X) : thickening δ ({x} : Set X) = ball x δ := by ext simp [mem_thickening_iff] theorem ball_subset_thickening {x : X} {E : Set X} (hx : x ∈ E) (δ : ℝ) : ball x δ ⊆ thickening δ E := Subset.trans (by simp [Subset.rfl]) (thickening_subset_of_subset δ <\| singleton_subset_iff.mpr hx) /-- The (open) `δ`-thickening `Metric.thickening δ E` of a subset `E` in a metric space equals the union of balls of radius `δ` centered at points of `E`. -/ theorem thickening_eq_biUnion_ball {δ : ℝ} {E : Set X} : thickening δ E = ⋃ x ∈ E, ball x δ := by ext x simp only [mem_iUnion₂, exists_prop] exact mem_thickening_iff protected theorem _root_.Bornology.IsBounded.thickening {δ : ℝ} {E : Set X} (h : IsBounded E) : IsBounded (thickening δ E) := by rcases E.eq_empty_or_nonempty with rfl \| ⟨x, hx⟩ · simp · refine (isBounded_iff_subset_closedBall x).2 ⟨δ + diam E, fun y hy ↦ ?_⟩ calc dist y x ≤ infDist y E + diam E := dist_le_infDist_add_diam (x := y) h hx _ ≤ δ + diam E := add_le_add_right ((mem_thickening_iff_infDist_lt ⟨x, hx⟩).1 hy).le _ end Thickening section Cthickening variable [PseudoEMetricSpace α] {δ ε : ℝ} {s t : Set α} {x : α}	open EMetric /-- The closed `δ`-thickening `Metric.cthickening δ E` of a subset `E` in a pseudo emetric space consists of those points that are at infimum distance at most `δ` from `E`. -/ def cthickening (δ : ℝ) (E : Set α) : Set α := { x : α \| infEdist x E ≤ ENNReal.ofReal δ } @[simp]	Mathlib/Topology/MetricSpace/Thickening.lean	175	182

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