Split (1)

train · 52.2k rows

Context stringlengths 227 76.5k	target stringlengths 0 11.6k	file_name stringlengths 21 79	start int64 14 3.67k	end int64 16 3.69k
/- Copyright (c) 2024 Antoine Chambert-Loir. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Antoine Chambert-Loir -/ import Mathlib.Algebra.Pointwise.Stabilizer import Mathlib.Data.Setoid.Partition import Mathlib.GroupTheory.GroupAction.Pointwise import Mathlib.GroupTheory.GroupAction.SubMulAction import Mathlib.GroupTheory.Index import Mathlib.Tactic.IntervalCases /-! # Blocks Given `SMul G X`, an action of a type `G` on a type `X`, we define - the predicate `MulAction.IsBlock G B` states that `B : Set X` is a block, which means that the sets `g • B`, for `g ∈ G`, are equal or disjoint. Under `Group G` and `MulAction G X`, this is equivalent to the classical definition `MulAction.IsBlock.def_one` - a bunch of lemmas that give examples of “trivial” blocks : ⊥, ⊤, singletons, and non trivial blocks: orbit of the group, orbit of a normal subgroup… The non-existence of nontrivial blocks is the definition of primitive actions. ## Results for actions on finite sets - `MulAction.IsBlock.ncard_block_mul_ncard_orbit_eq` : The cardinality of a block multiplied by the number of its translates is the cardinal of the ambient type - `MulAction.IsBlock.eq_univ_of_card_lt` : a too large block is equal to `Set.univ` - `MulAction.IsBlock.subsingleton_of_card_lt` : a too small block is a subsingleton - `MulAction.IsBlock.of_subset` : the intersections of the translates of a finite subset that contain a given point is a block - `MulAction.BlockMem` : the type of blocks containing a given element - `MulAction.BlockMem.instBoundedOrder` : the type of blocks containing a given element is a bounded order.	## References We follow [Wielandt-1964]. -/	Mathlib/GroupTheory/GroupAction/Blocks.lean	44	48
/- Copyright (c) 2020 Kexing Ying. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kexing Ying -/ import Mathlib.Algebra.Group.Conj import Mathlib.Algebra.Group.Pi.Lemmas import Mathlib.Algebra.Group.Subgroup.Ker /-! # Basic results on subgroups We prove basic results on the definitions of subgroups. The bundled subgroups use bundled monoid homomorphisms. Special thanks goes to Amelia Livingston and Yury Kudryashov for their help and inspiration. ## Main definitions Notation used here: - `G N` are `Group`s - `A` is an `AddGroup` - `H K` are `Subgroup`s of `G` or `AddSubgroup`s of `A` - `x` is an element of type `G` or type `A` - `f g : N →* G` are group homomorphisms - `s k` are sets of elements of type `G` Definitions in the file: * `Subgroup.prod H K` : the product of subgroups `H`, `K` of groups `G`, `N` respectively, `H × K` is a subgroup of `G × N` ## Implementation notes Subgroup inclusion is denoted `≤` rather than `⊆`, although `∈` is defined as membership of a subgroup's underlying set. ## Tags subgroup, subgroups -/ assert_not_exists OrderedAddCommMonoid Multiset Ring open Function open scoped Int variable {G G' G'' : Type} [Group G] [Group G'] [Group G''] variable {A : Type} [AddGroup A] section SubgroupClass variable {M S : Type} [DivInvMonoid M] [SetLike S M] [hSM : SubgroupClass S M] {H K : S} variable [SetLike S G] [SubgroupClass S G] @[to_additive] theorem div_mem_comm_iff {a b : G} : a / b ∈ H ↔ b / a ∈ H := inv_div b a ▸ inv_mem_iff end SubgroupClass namespace Subgroup variable (H K : Subgroup G) @[to_additive] protected theorem div_mem_comm_iff {a b : G} : a / b ∈ H ↔ b / a ∈ H := div_mem_comm_iff variable {k : Set G} open Set variable {N : Type} [Group N] {P : Type} [Group P] /-- Given `Subgroup`s `H`, `K` of groups `G`, `N` respectively, `H × K` as a subgroup of `G × N`. -/ @[to_additive prod "Given `AddSubgroup`s `H`, `K` of `AddGroup`s `A`, `B` respectively, `H × K` as an `AddSubgroup` of `A × B`."] def prod (H : Subgroup G) (K : Subgroup N) : Subgroup (G × N) := { Submonoid.prod H.toSubmonoid K.toSubmonoid with inv_mem' := fun hx => ⟨H.inv_mem' hx.1, K.inv_mem' hx.2⟩ } @[to_additive coe_prod] theorem coe_prod (H : Subgroup G) (K : Subgroup N) : (H.prod K : Set (G × N)) = (H : Set G) ×ˢ (K : Set N) := rfl @[to_additive mem_prod] theorem mem_prod {H : Subgroup G} {K : Subgroup N} {p : G × N} : p ∈ H.prod K ↔ p.1 ∈ H ∧ p.2 ∈ K := Iff.rfl open scoped Relator in @[to_additive prod_mono] theorem prod_mono : ((· ≤ ·) ⇒ (· ≤ ·) ⇒ (· ≤ ·)) (@prod G _ N _) (@prod G _ N _) := fun _s _s' hs _t _t' ht => Set.prod_mono hs ht @[to_additive prod_mono_right] theorem prod_mono_right (K : Subgroup G) : Monotone fun t : Subgroup N => K.prod t := prod_mono (le_refl K) @[to_additive prod_mono_left] theorem prod_mono_left (H : Subgroup N) : Monotone fun K : Subgroup G => K.prod H := fun _ _ hs => prod_mono hs (le_refl H) @[to_additive prod_top] theorem prod_top (K : Subgroup G) : K.prod (⊤ : Subgroup N) = K.comap (MonoidHom.fst G N) := ext fun x => by simp [mem_prod, MonoidHom.coe_fst] @[to_additive top_prod] theorem top_prod (H : Subgroup N) : (⊤ : Subgroup G).prod H = H.comap (MonoidHom.snd G N) := ext fun x => by simp [mem_prod, MonoidHom.coe_snd] @[to_additive (attr := simp) top_prod_top] theorem top_prod_top : (⊤ : Subgroup G).prod (⊤ : Subgroup N) = ⊤ := (top_prod _).trans <\| comap_top _ @[to_additive (attr := simp) bot_prod_bot] theorem bot_prod_bot : (⊥ : Subgroup G).prod (⊥ : Subgroup N) = ⊥ := SetLike.coe_injective <\| by simp [coe_prod] @[deprecated (since := "2025-03-11")] alias _root_.AddSubgroup.bot_sum_bot := AddSubgroup.bot_prod_bot @[to_additive le_prod_iff] theorem le_prod_iff {H : Subgroup G} {K : Subgroup N} {J : Subgroup (G × N)} : J ≤ H.prod K ↔ map (MonoidHom.fst G N) J ≤ H ∧ map (MonoidHom.snd G N) J ≤ K := by simpa only [← Subgroup.toSubmonoid_le] using Submonoid.le_prod_iff @[to_additive prod_le_iff] theorem prod_le_iff {H : Subgroup G} {K : Subgroup N} {J : Subgroup (G × N)} : H.prod K ≤ J ↔ map (MonoidHom.inl G N) H ≤ J ∧ map (MonoidHom.inr G N) K ≤ J := by simpa only [← Subgroup.toSubmonoid_le] using Submonoid.prod_le_iff @[to_additive (attr := simp) prod_eq_bot_iff] theorem prod_eq_bot_iff {H : Subgroup G} {K : Subgroup N} : H.prod K = ⊥ ↔ H = ⊥ ∧ K = ⊥ := by simpa only [← Subgroup.toSubmonoid_inj] using Submonoid.prod_eq_bot_iff @[to_additive closure_prod] theorem closure_prod {s : Set G} {t : Set N} (hs : 1 ∈ s) (ht : 1 ∈ t) : closure (s ×ˢ t) = (closure s).prod (closure t) := le_antisymm (closure_le _ \|>.2 <\| Set.prod_subset_prod_iff.2 <\| .inl ⟨subset_closure, subset_closure⟩) (prod_le_iff.2 ⟨ map_le_iff_le_comap.2 <\| closure_le _ \|>.2 fun _x hx => subset_closure ⟨hx, ht⟩, map_le_iff_le_comap.2 <\| closure_le _ \|>.2 fun _y hy => subset_closure ⟨hs, hy⟩⟩) /-- Product of subgroups is isomorphic to their product as groups. -/ @[to_additive prodEquiv "Product of additive subgroups is isomorphic to their product as additive groups"] def prodEquiv (H : Subgroup G) (K : Subgroup N) : H.prod K ≃ H × K := { Equiv.Set.prod (H : Set G) (K : Set N) with map_mul' := fun _ _ => rfl } section Pi variable {η : Type} {f : η → Type} -- defined here and not in Algebra.Group.Submonoid.Operations to have access to Algebra.Group.Pi /-- A version of `Set.pi` for submonoids. Given an index set `I` and a family of submodules `s : Π i, Submonoid f i`, `pi I s` is the submonoid of dependent functions `f : Π i, f i` such that `f i` belongs to `Pi I s` whenever `i ∈ I`. -/ @[to_additive "A version of `Set.pi` for `AddSubmonoid`s. Given an index set `I` and a family of submodules `s : Π i, AddSubmonoid f i`, `pi I s` is the `AddSubmonoid` of dependent functions `f : Π i, f i` such that `f i` belongs to `pi I s` whenever `i ∈ I`."] def _root_.Submonoid.pi [∀ i, MulOneClass (f i)] (I : Set η) (s : ∀ i, Submonoid (f i)) : Submonoid (∀ i, f i) where carrier := I.pi fun i => (s i).carrier one_mem' i _ := (s i).one_mem mul_mem' hp hq i hI := (s i).mul_mem (hp i hI) (hq i hI) variable [∀ i, Group (f i)] /-- A version of `Set.pi` for subgroups. Given an index set `I` and a family of submodules `s : Π i, Subgroup f i`, `pi I s` is the subgroup of dependent functions `f : Π i, f i` such that `f i` belongs to `pi I s` whenever `i ∈ I`. -/ @[to_additive "A version of `Set.pi` for `AddSubgroup`s. Given an index set `I` and a family of submodules `s : Π i, AddSubgroup f i`, `pi I s` is the `AddSubgroup` of dependent functions `f : Π i, f i` such that `f i` belongs to `pi I s` whenever `i ∈ I`."] def pi (I : Set η) (H : ∀ i, Subgroup (f i)) : Subgroup (∀ i, f i) := { Submonoid.pi I fun i => (H i).toSubmonoid with inv_mem' := fun hp i hI => (H i).inv_mem (hp i hI) } @[to_additive] theorem coe_pi (I : Set η) (H : ∀ i, Subgroup (f i)) : (pi I H : Set (∀ i, f i)) = Set.pi I fun i => (H i : Set (f i)) := rfl @[to_additive] theorem mem_pi (I : Set η) {H : ∀ i, Subgroup (f i)} {p : ∀ i, f i} : p ∈ pi I H ↔ ∀ i : η, i ∈ I → p i ∈ H i := Iff.rfl @[to_additive] theorem pi_top (I : Set η) : (pi I fun i => (⊤ : Subgroup (f i))) = ⊤ := ext fun x => by simp [mem_pi] @[to_additive] theorem pi_empty (H : ∀ i, Subgroup (f i)) : pi ∅ H = ⊤ := ext fun x => by simp [mem_pi] @[to_additive] theorem pi_bot : (pi Set.univ fun i => (⊥ : Subgroup (f i))) = ⊥ := (eq_bot_iff_forall _).mpr fun p hp => by simp only [mem_pi, mem_bot] at * ext j exact hp j trivial @[to_additive] theorem le_pi_iff {I : Set η} {H : ∀ i, Subgroup (f i)} {J : Subgroup (∀ i, f i)} : J ≤ pi I H ↔ ∀ i : η, i ∈ I → map (Pi.evalMonoidHom f i) J ≤ H i := by constructor · intro h i hi rintro _ ⟨x, hx, rfl⟩ exact (h hx) _ hi · intro h x hx i hi exact h i hi ⟨_, hx, rfl⟩ @[to_additive (attr := simp)] theorem mulSingle_mem_pi [DecidableEq η] {I : Set η} {H : ∀ i, Subgroup (f i)} (i : η) (x : f i) : Pi.mulSingle i x ∈ pi I H ↔ i ∈ I → x ∈ H i := by constructor · intro h hi simpa using h i hi · intro h j hj by_cases heq : j = i · subst heq simpa using h hj · simp [heq, one_mem] @[to_additive] theorem pi_eq_bot_iff (H : ∀ i, Subgroup (f i)) : pi Set.univ H = ⊥ ↔ ∀ i, H i = ⊥ := by classical simp only [eq_bot_iff_forall] constructor · intro h i x hx have : MonoidHom.mulSingle f i x = 1 := h (MonoidHom.mulSingle f i x) ((mulSingle_mem_pi i x).mpr fun _ => hx) simpa using congr_fun this i · exact fun h x hx => funext fun i => h _ _ (hx i trivial) end Pi end Subgroup namespace Subgroup variable {H K : Subgroup G} variable (H) /-- A subgroup is characteristic if it is fixed by all automorphisms. Several equivalent conditions are provided by lemmas of the form `Characteristic.iff...` -/ structure Characteristic : Prop where /-- `H` is fixed by all automorphisms -/ fixed : ∀ ϕ : G ≃* G, H.comap ϕ.toMonoidHom = H attribute [class] Characteristic instance (priority := 100) normal_of_characteristic [h : H.Characteristic] : H.Normal := ⟨fun a ha b => (SetLike.ext_iff.mp (h.fixed (MulAut.conj b)) a).mpr ha⟩ end Subgroup namespace AddSubgroup variable (H : AddSubgroup A) /-- An `AddSubgroup` is characteristic if it is fixed by all automorphisms. Several equivalent conditions are provided by lemmas of the form `Characteristic.iff...` -/ structure Characteristic : Prop where /-- `H` is fixed by all automorphisms -/ fixed : ∀ ϕ : A ≃+ A, H.comap ϕ.toAddMonoidHom = H attribute [to_additive] Subgroup.Characteristic attribute [class] Characteristic instance (priority := 100) normal_of_characteristic [h : H.Characteristic] : H.Normal := ⟨fun a ha b => (SetLike.ext_iff.mp (h.fixed (AddAut.conj b)) a).mpr ha⟩ end AddSubgroup namespace Subgroup variable {H K : Subgroup G} @[to_additive] theorem characteristic_iff_comap_eq : H.Characteristic ↔ ∀ ϕ : G ≃* G, H.comap ϕ.toMonoidHom = H := ⟨Characteristic.fixed, Characteristic.mk⟩ @[to_additive] theorem characteristic_iff_comap_le : H.Characteristic ↔ ∀ ϕ : G ≃* G, H.comap ϕ.toMonoidHom ≤ H := characteristic_iff_comap_eq.trans ⟨fun h ϕ => le_of_eq (h ϕ), fun h ϕ => le_antisymm (h ϕ) fun g hg => h ϕ.symm ((congr_arg (· ∈ H) (ϕ.symm_apply_apply g)).mpr hg)⟩ @[to_additive] theorem characteristic_iff_le_comap : H.Characteristic ↔ ∀ ϕ : G ≃* G, H ≤ H.comap ϕ.toMonoidHom := characteristic_iff_comap_eq.trans ⟨fun h ϕ => ge_of_eq (h ϕ), fun h ϕ => le_antisymm (fun g hg => (congr_arg (· ∈ H) (ϕ.symm_apply_apply g)).mp (h ϕ.symm hg)) (h ϕ)⟩ @[to_additive] theorem characteristic_iff_map_eq : H.Characteristic ↔ ∀ ϕ : G ≃* G, H.map ϕ.toMonoidHom = H := by simp_rw [map_equiv_eq_comap_symm'] exact characteristic_iff_comap_eq.trans ⟨fun h ϕ => h ϕ.symm, fun h ϕ => h ϕ.symm⟩ @[to_additive] theorem characteristic_iff_map_le : H.Characteristic ↔ ∀ ϕ : G ≃* G, H.map ϕ.toMonoidHom ≤ H := by simp_rw [map_equiv_eq_comap_symm'] exact characteristic_iff_comap_le.trans ⟨fun h ϕ => h ϕ.symm, fun h ϕ => h ϕ.symm⟩ @[to_additive] theorem characteristic_iff_le_map : H.Characteristic ↔ ∀ ϕ : G ≃* G, H ≤ H.map ϕ.toMonoidHom := by simp_rw [map_equiv_eq_comap_symm'] exact characteristic_iff_le_comap.trans ⟨fun h ϕ => h ϕ.symm, fun h ϕ => h ϕ.symm⟩ @[to_additive] instance botCharacteristic : Characteristic (⊥ : Subgroup G) := characteristic_iff_le_map.mpr fun _ϕ => bot_le @[to_additive] instance topCharacteristic : Characteristic (⊤ : Subgroup G) := characteristic_iff_map_le.mpr fun _ϕ => le_top variable (H) section Normalizer variable {H} @[to_additive] theorem normalizer_eq_top_iff : H.normalizer = ⊤ ↔ H.Normal := eq_top_iff.trans ⟨fun h => ⟨fun a ha b => (h (mem_top b) a).mp ha⟩, fun h a _ha b => ⟨fun hb => h.conj_mem b hb a, fun hb => by rwa [h.mem_comm_iff, inv_mul_cancel_left] at hb⟩⟩ variable (H) in @[to_additive] theorem normalizer_eq_top [h : H.Normal] : H.normalizer = ⊤ := normalizer_eq_top_iff.mpr h variable {N : Type} [Group N] /-- The preimage of the normalizer is contained in the normalizer of the preimage. -/ @[to_additive "The preimage of the normalizer is contained in the normalizer of the preimage."] theorem le_normalizer_comap (f : N → G) : H.normalizer.comap f ≤ (H.comap f).normalizer := fun x => by simp only [mem_normalizer_iff, mem_comap] intro h n simp [h (f n)] /-- The image of the normalizer is contained in the normalizer of the image. -/ @[to_additive "The image of the normalizer is contained in the normalizer of the image."] theorem le_normalizer_map (f : G →* N) : H.normalizer.map f ≤ (H.map f).normalizer := fun _ => by simp only [and_imp, exists_prop, mem_map, exists_imp, mem_normalizer_iff] rintro x hx rfl n constructor · rintro ⟨y, hy, rfl⟩ use x * y * x⁻¹, (hx y).1 hy simp · rintro ⟨y, hyH, hy⟩ use x⁻¹ * y * x rw [hx] simp [hy, hyH, mul_assoc] @[to_additive] theorem comap_normalizer_eq_of_le_range {f : N →* G} (h : H ≤ f.range) : comap f H.normalizer = (comap f H).normalizer := by apply le_antisymm (le_normalizer_comap f) rw [← map_le_iff_le_comap] apply (le_normalizer_map f).trans rw [map_comap_eq_self h] @[to_additive] theorem subgroupOf_normalizer_eq {H N : Subgroup G} (h : H ≤ N) : H.normalizer.subgroupOf N = (H.subgroupOf N).normalizer := comap_normalizer_eq_of_le_range (h.trans_eq N.range_subtype.symm) @[to_additive] theorem normal_subgroupOf_iff_le_normalizer (h : H ≤ K) : (H.subgroupOf K).Normal ↔ K ≤ H.normalizer := by rw [← subgroupOf_eq_top, subgroupOf_normalizer_eq h, normalizer_eq_top_iff] @[to_additive] theorem normal_subgroupOf_iff_le_normalizer_inf : (H.subgroupOf K).Normal ↔ K ≤ (H ⊓ K).normalizer := inf_subgroupOf_right H K ▸ normal_subgroupOf_iff_le_normalizer inf_le_right @[to_additive] instance (priority := 100) normal_in_normalizer : (H.subgroupOf H.normalizer).Normal := (normal_subgroupOf_iff_le_normalizer H.le_normalizer).mpr le_rfl @[to_additive] theorem le_normalizer_of_normal_subgroupOf [hK : (H.subgroupOf K).Normal] (HK : H ≤ K) : K ≤ H.normalizer := (normal_subgroupOf_iff_le_normalizer HK).mp hK @[to_additive] theorem subset_normalizer_of_normal {S : Set G} [hH : H.Normal] : S ⊆ H.normalizer := (@normalizer_eq_top _ _ H hH) ▸ le_top @[to_additive] theorem le_normalizer_of_normal [H.Normal] : K ≤ H.normalizer := subset_normalizer_of_normal @[to_additive] theorem inf_normalizer_le_normalizer_inf : H.normalizer ⊓ K.normalizer ≤ (H ⊓ K).normalizer := fun _ h g ↦ and_congr (h.1 g) (h.2 g) variable (G) in /-- Every proper subgroup `H` of `G` is a proper normal subgroup of the normalizer of `H` in `G`. -/ def _root_.NormalizerCondition := ∀ H : Subgroup G, H < ⊤ → H < normalizer H /-- Alternative phrasing of the normalizer condition: Only the full group is self-normalizing. This may be easier to work with, as it avoids inequalities and negations. -/ theorem _root_.normalizerCondition_iff_only_full_group_self_normalizing : NormalizerCondition G ↔ ∀ H : Subgroup G, H.normalizer = H → H = ⊤ := by apply forall_congr'; intro H simp only [lt_iff_le_and_ne, le_normalizer, le_top, Ne] tauto variable (H) end Normalizer end Subgroup namespace Group variable {s : Set G} /-- Given a set `s`, `conjugatesOfSet s` is the set of all conjugates of the elements of `s`. -/ def conjugatesOfSet (s : Set G) : Set G := ⋃ a ∈ s, conjugatesOf a theorem mem_conjugatesOfSet_iff {x : G} : x ∈ conjugatesOfSet s ↔ ∃ a ∈ s, IsConj a x := by rw [conjugatesOfSet, Set.mem_iUnion₂] simp only [conjugatesOf, isConj_iff, Set.mem_setOf_eq, exists_prop] theorem subset_conjugatesOfSet : s ⊆ conjugatesOfSet s := fun (x : G) (h : x ∈ s) => mem_conjugatesOfSet_iff.2 ⟨x, h, IsConj.refl _⟩ theorem conjugatesOfSet_mono {s t : Set G} (h : s ⊆ t) : conjugatesOfSet s ⊆ conjugatesOfSet t := Set.biUnion_subset_biUnion_left h theorem conjugates_subset_normal {N : Subgroup G} [tn : N.Normal] {a : G} (h : a ∈ N) : conjugatesOf a ⊆ N := by rintro a hc obtain ⟨c, rfl⟩ := isConj_iff.1 hc exact tn.conj_mem a h c theorem conjugatesOfSet_subset {s : Set G} {N : Subgroup G} [N.Normal] (h : s ⊆ N) : conjugatesOfSet s ⊆ N := Set.iUnion₂_subset fun _x H => conjugates_subset_normal (h H) /-- The set of conjugates of `s` is closed under conjugation. -/ theorem conj_mem_conjugatesOfSet {x c : G} : x ∈ conjugatesOfSet s → c * x * c⁻¹ ∈ conjugatesOfSet s := fun H => by rcases mem_conjugatesOfSet_iff.1 H with ⟨a, h₁, h₂⟩ exact mem_conjugatesOfSet_iff.2 ⟨a, h₁, h₂.trans (isConj_iff.2 ⟨c, rfl⟩)⟩ end Group namespace Subgroup open Group variable {s : Set G} /-- The normal closure of a set `s` is the subgroup closure of all the conjugates of elements of `s`. It is the smallest normal subgroup containing `s`. -/ def normalClosure (s : Set G) : Subgroup G := closure (conjugatesOfSet s) theorem conjugatesOfSet_subset_normalClosure : conjugatesOfSet s ⊆ normalClosure s := subset_closure theorem subset_normalClosure : s ⊆ normalClosure s := Set.Subset.trans subset_conjugatesOfSet conjugatesOfSet_subset_normalClosure theorem le_normalClosure {H : Subgroup G} : H ≤ normalClosure ↑H := fun _ h => subset_normalClosure h /-- The normal closure of `s` is a normal subgroup. -/ instance normalClosure_normal : (normalClosure s).Normal := ⟨fun n h g => by refine Subgroup.closure_induction (fun x hx => ?_) ?_ (fun x y _ _ ihx ihy => ?_) (fun x _ ihx => ?_) h · exact conjugatesOfSet_subset_normalClosure (conj_mem_conjugatesOfSet hx) · simpa using (normalClosure s).one_mem · rw [← conj_mul] exact mul_mem ihx ihy · rw [← conj_inv] exact inv_mem ihx⟩ /-- The normal closure of `s` is the smallest normal subgroup containing `s`. -/ theorem normalClosure_le_normal {N : Subgroup G} [N.Normal] (h : s ⊆ N) : normalClosure s ≤ N := by intro a w refine closure_induction (fun x hx => ?_) ?_ (fun x y _ _ ihx ihy => ?_) (fun x _ ihx => ?_) w · exact conjugatesOfSet_subset h hx · exact one_mem _ · exact mul_mem ihx ihy · exact inv_mem ihx theorem normalClosure_subset_iff {N : Subgroup G} [N.Normal] : s ⊆ N ↔ normalClosure s ≤ N := ⟨normalClosure_le_normal, Set.Subset.trans subset_normalClosure⟩ @[gcongr] theorem normalClosure_mono {s t : Set G} (h : s ⊆ t) : normalClosure s ≤ normalClosure t := normalClosure_le_normal (Set.Subset.trans h subset_normalClosure) theorem normalClosure_eq_iInf : normalClosure s = ⨅ (N : Subgroup G) (_ : Normal N) (_ : s ⊆ N), N := le_antisymm (le_iInf fun _ => le_iInf fun _ => le_iInf normalClosure_le_normal) (iInf_le_of_le (normalClosure s) (iInf_le_of_le (by infer_instance) (iInf_le_of_le subset_normalClosure le_rfl))) @[simp] theorem normalClosure_eq_self (H : Subgroup G) [H.Normal] : normalClosure ↑H = H := le_antisymm (normalClosure_le_normal rfl.subset) le_normalClosure theorem normalClosure_idempotent : normalClosure ↑(normalClosure s) = normalClosure s := normalClosure_eq_self _ theorem closure_le_normalClosure {s : Set G} : closure s ≤ normalClosure s := by simp only [subset_normalClosure, closure_le] @[simp] theorem normalClosure_closure_eq_normalClosure {s : Set G} : normalClosure ↑(closure s) = normalClosure s := le_antisymm (normalClosure_le_normal closure_le_normalClosure) (normalClosure_mono subset_closure) /-- The normal core of a subgroup `H` is the largest normal subgroup of `G` contained in `H`, as shown by `Subgroup.normalCore_eq_iSup`. -/ def normalCore (H : Subgroup G) : Subgroup G where carrier := { a : G \| ∀ b : G, b * a * b⁻¹ ∈ H } one_mem' a := by rw [mul_one, mul_inv_cancel]; exact H.one_mem inv_mem' {_} h b := (congr_arg (· ∈ H) conj_inv).mp (H.inv_mem (h b)) mul_mem' {_ _} ha hb c := (congr_arg (· ∈ H) conj_mul).mp (H.mul_mem (ha c) (hb c)) theorem normalCore_le (H : Subgroup G) : H.normalCore ≤ H := fun a h => by rw [← mul_one a, ← inv_one, ← one_mul a] exact h 1 instance normalCore_normal (H : Subgroup G) : H.normalCore.Normal := ⟨fun a h b c => by rw [mul_assoc, mul_assoc, ← mul_inv_rev, ← mul_assoc, ← mul_assoc]; exact h (c * b)⟩ theorem normal_le_normalCore {H : Subgroup G} {N : Subgroup G} [hN : N.Normal] : N ≤ H.normalCore ↔ N ≤ H := ⟨ge_trans H.normalCore_le, fun h_le n hn g => h_le (hN.conj_mem n hn g)⟩ theorem normalCore_mono {H K : Subgroup G} (h : H ≤ K) : H.normalCore ≤ K.normalCore := normal_le_normalCore.mpr (H.normalCore_le.trans h) theorem normalCore_eq_iSup (H : Subgroup G) : H.normalCore = ⨆ (N : Subgroup G) (_ : Normal N) (_ : N ≤ H), N := le_antisymm (le_iSup_of_le H.normalCore (le_iSup_of_le H.normalCore_normal (le_iSup_of_le H.normalCore_le le_rfl))) (iSup_le fun _ => iSup_le fun _ => iSup_le normal_le_normalCore.mpr) @[simp] theorem normalCore_eq_self (H : Subgroup G) [H.Normal] : H.normalCore = H := le_antisymm H.normalCore_le (normal_le_normalCore.mpr le_rfl) theorem normalCore_idempotent (H : Subgroup G) : H.normalCore.normalCore = H.normalCore := H.normalCore.normalCore_eq_self end Subgroup namespace MonoidHom variable {N : Type} {P : Type} [Group N] [Group P] (K : Subgroup G) open Subgroup section Ker variable {M : Type} [MulOneClass M] @[to_additive prodMap_comap_prod] theorem prodMap_comap_prod {G' : Type} {N' : Type} [Group G'] [Group N'] (f : G → N) (g : G' →* N') (S : Subgroup N) (S' : Subgroup N') : (S.prod S').comap (prodMap f g) = (S.comap f).prod (S'.comap g) := SetLike.coe_injective <\| Set.preimage_prod_map_prod f g _ _ @[deprecated (since := "2025-03-11")] alias _root_.AddMonoidHom.sumMap_comap_sum := AddMonoidHom.prodMap_comap_prod @[to_additive ker_prodMap] theorem ker_prodMap {G' : Type} {N' : Type} [Group G'] [Group N'] (f : G →* N) (g : G' →* N') : (prodMap f g).ker = f.ker.prod g.ker := by rw [← comap_bot, ← comap_bot, ← comap_bot, ← prodMap_comap_prod, bot_prod_bot] @[deprecated (since := "2025-03-11")] alias _root_.AddMonoidHom.ker_sumMap := AddMonoidHom.ker_prodMap @[to_additive (attr := simp)] lemma ker_fst : ker (fst G G') = .prod ⊥ ⊤ := SetLike.ext fun _ => (iff_of_eq (and_true _)).symm @[to_additive (attr := simp)] lemma ker_snd : ker (snd G G') = .prod ⊤ ⊥ := SetLike.ext fun _ => (iff_of_eq (true_and _)).symm end Ker end MonoidHom namespace Subgroup variable {N : Type} [Group N] (H : Subgroup G) @[to_additive] theorem Normal.map {H : Subgroup G} (h : H.Normal) (f : G → N) (hf : Function.Surjective f) : (H.map f).Normal := by rw [← normalizer_eq_top_iff, ← top_le_iff, ← f.range_eq_top_of_surjective hf, f.range_eq_map, ← H.normalizer_eq_top] exact le_normalizer_map _ end Subgroup namespace Subgroup open MonoidHom variable {N : Type} [Group N] (f : G → N) /-- The preimage of the normalizer is equal to the normalizer of the preimage of a surjective function. -/ @[to_additive "The preimage of the normalizer is equal to the normalizer of the preimage of a surjective function."] theorem comap_normalizer_eq_of_surjective (H : Subgroup G) {f : N →* G} (hf : Function.Surjective f) : H.normalizer.comap f = (H.comap f).normalizer := comap_normalizer_eq_of_le_range fun x _ ↦ hf x @[deprecated (since := "2025-03-13")] alias comap_normalizer_eq_of_injective_of_le_range := comap_normalizer_eq_of_le_range @[deprecated (since := "2025-03-13")] alias _root_.AddSubgroup.comap_normalizer_eq_of_injective_of_le_range := AddSubgroup.comap_normalizer_eq_of_le_range /-- The image of the normalizer is equal to the normalizer of the image of an isomorphism. -/ @[to_additive "The image of the normalizer is equal to the normalizer of the image of an isomorphism."] theorem map_equiv_normalizer_eq (H : Subgroup G) (f : G ≃* N) : H.normalizer.map f.toMonoidHom = (H.map f.toMonoidHom).normalizer := by ext x simp only [mem_normalizer_iff, mem_map_equiv] rw [f.toEquiv.forall_congr] intro simp /-- The image of the normalizer is equal to the normalizer of the image of a bijective function. -/ @[to_additive "The image of the normalizer is equal to the normalizer of the image of a bijective function."] theorem map_normalizer_eq_of_bijective (H : Subgroup G) {f : G →* N} (hf : Function.Bijective f) : H.normalizer.map f = (H.map f).normalizer := map_equiv_normalizer_eq H (MulEquiv.ofBijective f hf) end Subgroup namespace MonoidHom variable {G₁ G₂ G₃ : Type} [Group G₁] [Group G₂] [Group G₃] variable (f : G₁ → G₂) (f_inv : G₂ → G₁) /-- Auxiliary definition used to define `liftOfRightInverse` -/ @[to_additive "Auxiliary definition used to define `liftOfRightInverse`"] def liftOfRightInverseAux (hf : Function.RightInverse f_inv f) (g : G₁ →* G₃) (hg : f.ker ≤ g.ker) : G₂ →* G₃ where toFun b := g (f_inv b) map_one' := hg (hf 1) map_mul' := by intro x y rw [← g.map_mul, ← mul_inv_eq_one, ← g.map_inv, ← g.map_mul, ← g.mem_ker] apply hg rw [f.mem_ker, f.map_mul, f.map_inv, mul_inv_eq_one, f.map_mul] simp only [hf _] @[to_additive (attr := simp)] theorem liftOfRightInverseAux_comp_apply (hf : Function.RightInverse f_inv f) (g : G₁ →* G₃) (hg : f.ker ≤ g.ker) (x : G₁) : (f.liftOfRightInverseAux f_inv hf g hg) (f x) = g x := by dsimp [liftOfRightInverseAux] rw [← mul_inv_eq_one, ← g.map_inv, ← g.map_mul, ← g.mem_ker] apply hg rw [f.mem_ker, f.map_mul, f.map_inv, mul_inv_eq_one] simp only [hf _] /-- `liftOfRightInverse f hf g hg` is the unique group homomorphism `φ` * such that `φ.comp f = g` (`MonoidHom.liftOfRightInverse_comp`), * where `f : G₁ →+* G₂` has a RightInverse `f_inv` (`hf`), * and `g : G₂ →+* G₃` satisfies `hg : f.ker ≤ g.ker`. See `MonoidHom.eq_liftOfRightInverse` for the uniqueness lemma. ``` G₁. \| \ f \| \ g \| \ v \⌟ G₂----> G₃ ∃!φ ``` -/ @[to_additive "`liftOfRightInverse f f_inv hf g hg` is the unique additive group homomorphism `φ` * such that `φ.comp f = g` (`AddMonoidHom.liftOfRightInverse_comp`), * where `f : G₁ →+ G₂` has a RightInverse `f_inv` (`hf`), * and `g : G₂ →+ G₃` satisfies `hg : f.ker ≤ g.ker`. See `AddMonoidHom.eq_liftOfRightInverse` for the uniqueness lemma. ``` G₁. \| \\ f \| \\ g \| \\ v \\⌟ G₂----> G₃ ∃!φ ```"] def liftOfRightInverse (hf : Function.RightInverse f_inv f) : { g : G₁ →* G₃ // f.ker ≤ g.ker } ≃ (G₂ →* G₃) where toFun g := f.liftOfRightInverseAux f_inv hf g.1 g.2 invFun φ := ⟨φ.comp f, fun x hx ↦ mem_ker.mpr <\| by simp [mem_ker.mp hx]⟩ left_inv g := by ext simp only [comp_apply, liftOfRightInverseAux_comp_apply, Subtype.coe_mk] right_inv φ := by ext b simp [liftOfRightInverseAux, hf b] /-- A non-computable version of `MonoidHom.liftOfRightInverse` for when no computable right inverse is available, that uses `Function.surjInv`. -/ @[to_additive (attr := simp) "A non-computable version of `AddMonoidHom.liftOfRightInverse` for when no computable right inverse is available."] noncomputable abbrev liftOfSurjective (hf : Function.Surjective f) : { g : G₁ →* G₃ // f.ker ≤ g.ker } ≃ (G₂ →* G₃) := f.liftOfRightInverse (Function.surjInv hf) (Function.rightInverse_surjInv hf) @[to_additive (attr := simp)] theorem liftOfRightInverse_comp_apply (hf : Function.RightInverse f_inv f) (g : { g : G₁ →* G₃ // f.ker ≤ g.ker }) (x : G₁) : (f.liftOfRightInverse f_inv hf g) (f x) = g.1 x := f.liftOfRightInverseAux_comp_apply f_inv hf g.1 g.2 x @[to_additive (attr := simp)] theorem liftOfRightInverse_comp (hf : Function.RightInverse f_inv f) (g : { g : G₁ →* G₃ // f.ker ≤ g.ker }) : (f.liftOfRightInverse f_inv hf g).comp f = g := MonoidHom.ext <\| f.liftOfRightInverse_comp_apply f_inv hf g @[to_additive] theorem eq_liftOfRightInverse (hf : Function.RightInverse f_inv f) (g : G₁ →* G₃) (hg : f.ker ≤ g.ker) (h : G₂ →* G₃) (hh : h.comp f = g) : h = f.liftOfRightInverse f_inv hf ⟨g, hg⟩ := by simp_rw [← hh] exact ((f.liftOfRightInverse f_inv hf).apply_symm_apply _).symm end MonoidHom variable {N : Type} [Group N] namespace Subgroup -- Here `H.Normal` is an explicit argument so we can use dot notation with `comap`. @[to_additive] theorem Normal.comap {H : Subgroup N} (hH : H.Normal) (f : G → N) : (H.comap f).Normal := ⟨fun _ => by simp +contextual [Subgroup.mem_comap, hH.conj_mem]⟩ @[to_additive] instance (priority := 100) normal_comap {H : Subgroup N} [nH : H.Normal] (f : G →* N) : (H.comap f).Normal := nH.comap _ -- Here `H.Normal` is an explicit argument so we can use dot notation with `subgroupOf`. @[to_additive] theorem Normal.subgroupOf {H : Subgroup G} (hH : H.Normal) (K : Subgroup G) : (H.subgroupOf K).Normal := hH.comap _ @[to_additive] instance (priority := 100) normal_subgroupOf {H N : Subgroup G} [N.Normal] : (N.subgroupOf H).Normal := Subgroup.normal_comap _ theorem map_normalClosure (s : Set G) (f : G →* N) (hf : Surjective f) : (normalClosure s).map f = normalClosure (f '' s) := by have : Normal (map f (normalClosure s)) := Normal.map inferInstance f hf apply le_antisymm · simp [map_le_iff_le_comap, normalClosure_le_normal, coe_comap, ← Set.image_subset_iff, subset_normalClosure] · exact normalClosure_le_normal (Set.image_subset f subset_normalClosure) theorem comap_normalClosure (s : Set N) (f : G ≃* N) : normalClosure (f ⁻¹' s) = (normalClosure s).comap f := by have := Set.preimage_equiv_eq_image_symm s f.toEquiv simp_all [comap_equiv_eq_map_symm, map_normalClosure s (f.symm : N →* G) f.symm.surjective] lemma Normal.of_map_injective {G H : Type} [Group G] [Group H] {φ : G → H} (hφ : Function.Injective φ) {L : Subgroup G} (n : (L.map φ).Normal) : L.Normal := L.comap_map_eq_self_of_injective hφ ▸ n.comap φ theorem Normal.of_map_subtype {K : Subgroup G} {L : Subgroup K} (n : (Subgroup.map K.subtype L).Normal) : L.Normal := n.of_map_injective K.subtype_injective end Subgroup namespace Subgroup section SubgroupNormal @[to_additive] theorem normal_subgroupOf_iff {H K : Subgroup G} (hHK : H ≤ K) : (H.subgroupOf K).Normal ↔ ∀ h k, h ∈ H → k ∈ K → k * h * k⁻¹ ∈ H := ⟨fun hN h k hH hK => hN.conj_mem ⟨h, hHK hH⟩ hH ⟨k, hK⟩, fun hN => { conj_mem := fun h hm k => hN h.1 k.1 hm k.2 }⟩ @[to_additive prod_addSubgroupOf_prod_normal] instance prod_subgroupOf_prod_normal {H₁ K₁ : Subgroup G} {H₂ K₂ : Subgroup N} [h₁ : (H₁.subgroupOf K₁).Normal] [h₂ : (H₂.subgroupOf K₂).Normal] : ((H₁.prod H₂).subgroupOf (K₁.prod K₂)).Normal where conj_mem n hgHK g := ⟨h₁.conj_mem ⟨(n : G × N).fst, (mem_prod.mp n.2).1⟩ hgHK.1 ⟨(g : G × N).fst, (mem_prod.mp g.2).1⟩, h₂.conj_mem ⟨(n : G × N).snd, (mem_prod.mp n.2).2⟩ hgHK.2 ⟨(g : G × N).snd, (mem_prod.mp g.2).2⟩⟩ @[deprecated (since := "2025-03-11")] alias _root_.AddSubgroup.sum_addSubgroupOf_sum_normal := AddSubgroup.prod_addSubgroupOf_prod_normal @[to_additive prod_normal] instance prod_normal (H : Subgroup G) (K : Subgroup N) [hH : H.Normal] [hK : K.Normal] : (H.prod K).Normal where conj_mem n hg g := ⟨hH.conj_mem n.fst (Subgroup.mem_prod.mp hg).1 g.fst, hK.conj_mem n.snd (Subgroup.mem_prod.mp hg).2 g.snd⟩ @[deprecated (since := "2025-03-11")] alias _root_.AddSubgroup.sum_normal := AddSubgroup.prod_normal @[to_additive] theorem inf_subgroupOf_inf_normal_of_right (A B' B : Subgroup G) [hN : (B'.subgroupOf B).Normal] : ((A ⊓ B').subgroupOf (A ⊓ B)).Normal := by rw [normal_subgroupOf_iff_le_normalizer_inf] at hN ⊢ rw [inf_inf_inf_comm, inf_idem] exact le_trans (inf_le_inf A.le_normalizer hN) (inf_normalizer_le_normalizer_inf) @[to_additive] theorem inf_subgroupOf_inf_normal_of_left {A' A : Subgroup G} (B : Subgroup G) [hN : (A'.subgroupOf A).Normal] : ((A' ⊓ B).subgroupOf (A ⊓ B)).Normal := by rw [normal_subgroupOf_iff_le_normalizer_inf] at hN ⊢ rw [inf_inf_inf_comm, inf_idem] exact le_trans (inf_le_inf hN B.le_normalizer) (inf_normalizer_le_normalizer_inf) @[to_additive] instance normal_inf_normal (H K : Subgroup G) [hH : H.Normal] [hK : K.Normal] : (H ⊓ K).Normal := ⟨fun n hmem g => ⟨hH.conj_mem n hmem.1 g, hK.conj_mem n hmem.2 g⟩⟩ @[to_additive] theorem normal_iInf_normal {ι : Type} {a : ι → Subgroup G} (norm : ∀ i : ι, (a i).Normal) : (iInf a).Normal := by constructor intro g g_in_iInf h rw [Subgroup.mem_iInf] at g_in_iInf ⊢ intro i exact (norm i).conj_mem g (g_in_iInf i) h @[to_additive] theorem SubgroupNormal.mem_comm {H K : Subgroup G} (hK : H ≤ K) [hN : (H.subgroupOf K).Normal] {a b : G} (hb : b ∈ K) (h : a b ∈ H) : b * a ∈ H := by have := (normal_subgroupOf_iff hK).mp hN (a * b) b h hb rwa [mul_assoc, mul_assoc, mul_inv_cancel, mul_one] at this /-- Elements of disjoint, normal subgroups commute. -/ @[to_additive "Elements of disjoint, normal subgroups commute."] theorem commute_of_normal_of_disjoint (H₁ H₂ : Subgroup G) (hH₁ : H₁.Normal) (hH₂ : H₂.Normal) (hdis : Disjoint H₁ H₂) (x y : G) (hx : x ∈ H₁) (hy : y ∈ H₂) : Commute x y := by suffices x * y * x⁻¹ * y⁻¹ = 1 by show x * y = y * x · rw [mul_assoc, mul_eq_one_iff_eq_inv] at this simpa apply hdis.le_bot constructor · suffices x * (y * x⁻¹ * y⁻¹) ∈ H₁ by simpa [mul_assoc] exact H₁.mul_mem hx (hH₁.conj_mem _ (H₁.inv_mem hx) _) · show x * y * x⁻¹ * y⁻¹ ∈ H₂ apply H₂.mul_mem _ (H₂.inv_mem hy) apply hH₂.conj_mem _ hy @[to_additive] theorem normal_subgroupOf_of_le_normalizer {H N : Subgroup G} (hLE : H ≤ N.normalizer) : (N.subgroupOf H).Normal := by rw [normal_subgroupOf_iff_le_normalizer_inf] exact (le_inf hLE H.le_normalizer).trans inf_normalizer_le_normalizer_inf @[to_additive] theorem normal_subgroupOf_sup_of_le_normalizer {H N : Subgroup G} (hLE : H ≤ N.normalizer) : (N.subgroupOf (H ⊔ N)).Normal := by rw [normal_subgroupOf_iff_le_normalizer le_sup_right] exact sup_le hLE le_normalizer end SubgroupNormal end Subgroup namespace IsConj open Subgroup theorem normalClosure_eq_top_of {N : Subgroup G} [hn : N.Normal] {g g' : G} {hg : g ∈ N} {hg' : g' ∈ N} (hc : IsConj g g') (ht : normalClosure ({⟨g, hg⟩} : Set N) = ⊤) : normalClosure ({⟨g', hg'⟩} : Set N) = ⊤ := by obtain ⟨c, rfl⟩ := isConj_iff.1 hc have h : ∀ x : N, (MulAut.conj c) x ∈ N := by rintro ⟨x, hx⟩ exact hn.conj_mem _ hx c have hs : Function.Surjective (((MulAut.conj c).toMonoidHom.restrict N).codRestrict _ h) := by rintro ⟨x, hx⟩ refine ⟨⟨c⁻¹ * x * c, ?_⟩, ?_⟩ · have h := hn.conj_mem _ hx c⁻¹ rwa [inv_inv] at h simp only [MonoidHom.codRestrict_apply, MulEquiv.coe_toMonoidHom, MulAut.conj_apply, coe_mk, MonoidHom.restrict_apply, Subtype.mk_eq_mk, ← mul_assoc, mul_inv_cancel, one_mul] rw [mul_assoc, mul_inv_cancel, mul_one] rw [eq_top_iff, ← MonoidHom.range_eq_top.2 hs, MonoidHom.range_eq_map] refine le_trans (map_mono (eq_top_iff.1 ht)) (map_le_iff_le_comap.2 (normalClosure_le_normal ?_)) rw [Set.singleton_subset_iff, SetLike.mem_coe] simp only [MonoidHom.codRestrict_apply, MulEquiv.coe_toMonoidHom, MulAut.conj_apply, coe_mk, MonoidHom.restrict_apply, mem_comap] exact subset_normalClosure (Set.mem_singleton _) end IsConj namespace ConjClasses /-- The conjugacy classes that are not trivial. -/ def noncenter (G : Type) [Monoid G] : Set (ConjClasses G) := {x \| x.carrier.Nontrivial} @[simp] lemma mem_noncenter {G} [Monoid G] (g : ConjClasses G) : g ∈ noncenter G ↔ g.carrier.Nontrivial := Iff.rfl end ConjClasses /-- Suppose `G` acts on `M` and `I` is a subgroup of `M`. The inertia subgroup of `I` is the subgroup of `G` whose action is trivial mod `I`. -/ def AddSubgroup.inertia {M : Type} [AddGroup M] (I : AddSubgroup M) (G : Type) [Group G] [MulAction G M] : Subgroup G where carrier := { σ \| ∀ x, σ • x - x ∈ I } mul_mem' {a b} ha hb x := by simpa [mul_smul] using add_mem (ha (b • x)) (hb x) one_mem' := by simp [zero_mem] inv_mem' {a} ha x := by simpa using sub_mem_comm_iff.mp (ha (a⁻¹ • x)) @[simp] lemma AddSubgroup.mem_inertia {M : Type} [AddGroup M] {I : AddSubgroup M} {G : Type*} [Group G] [MulAction G M] {σ : G} : σ ∈ I.inertia G ↔ ∀ x, σ • x - x ∈ I := .rfl		Mathlib/Algebra/Group/Subgroup/Basic.lean	2,555	2,557
/- Copyright (c) 2021 Thomas Browning. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Thomas Browning -/ import Mathlib.Combinatorics.Hall.Basic import Mathlib.Data.Matrix.Rank import Mathlib.LinearAlgebra.Projectivization.Constructions /-! # Configurations of Points and lines This file introduces abstract configurations of points and lines, and proves some basic properties. ## Main definitions * `Configuration.Nondegenerate`: Excludes certain degenerate configurations, and imposes uniqueness of intersection points. * `Configuration.HasPoints`: A nondegenerate configuration in which every pair of lines has an intersection point. * `Configuration.HasLines`: A nondegenerate configuration in which every pair of points has a line through them. * `Configuration.lineCount`: The number of lines through a given point. * `Configuration.pointCount`: The number of lines through a given line. ## Main statements * `Configuration.HasLines.card_le`: `HasLines` implies `\|P\| ≤ \|L\|`. * `Configuration.HasPoints.card_le`: `HasPoints` implies `\|L\| ≤ \|P\|`. * `Configuration.HasLines.hasPoints`: `HasLines` and `\|P\| = \|L\|` implies `HasPoints`. * `Configuration.HasPoints.hasLines`: `HasPoints` and `\|P\| = \|L\|` implies `HasLines`. Together, these four statements say that any two of the following properties imply the third: (a) `HasLines`, (b) `HasPoints`, (c) `\|P\| = \|L\|`. -/ open Finset namespace Configuration variable (P L : Type) [Membership P L] /-- A type synonym. -/ def Dual := P instance [h : Inhabited P] : Inhabited (Dual P) := h instance [Finite P] : Finite (Dual P) := ‹Finite P› instance [h : Fintype P] : Fintype (Dual P) := h set_option synthInstance.checkSynthOrder false in instance : Membership (Dual L) (Dual P) := ⟨Function.swap (Membership.mem : L → P → Prop)⟩ /-- A configuration is nondegenerate if: 1) there does not exist a line that passes through all of the points, 2) there does not exist a point that is on all of the lines, 3) there is at most one line through any two points, 4) any two lines have at most one intersection point. Conditions 3 and 4 are equivalent. -/ class Nondegenerate : Prop where exists_point : ∀ l : L, ∃ p, p ∉ l exists_line : ∀ p, ∃ l : L, p ∉ l eq_or_eq : ∀ {p₁ p₂ : P} {l₁ l₂ : L}, p₁ ∈ l₁ → p₂ ∈ l₁ → p₁ ∈ l₂ → p₂ ∈ l₂ → p₁ = p₂ ∨ l₁ = l₂ /-- A nondegenerate configuration in which every pair of lines has an intersection point. -/ class HasPoints extends Nondegenerate P L where /-- Intersection of two lines -/ mkPoint : ∀ {l₁ l₂ : L}, l₁ ≠ l₂ → P mkPoint_ax : ∀ {l₁ l₂ : L} (h : l₁ ≠ l₂), mkPoint h ∈ l₁ ∧ mkPoint h ∈ l₂ /-- A nondegenerate configuration in which every pair of points has a line through them. -/ class HasLines extends Nondegenerate P L where /-- Line through two points -/ mkLine : ∀ {p₁ p₂ : P}, p₁ ≠ p₂ → L mkLine_ax : ∀ {p₁ p₂ : P} (h : p₁ ≠ p₂), p₁ ∈ mkLine h ∧ p₂ ∈ mkLine h open Nondegenerate open HasPoints (mkPoint mkPoint_ax) open HasLines (mkLine mkLine_ax) instance Dual.Nondegenerate [Nondegenerate P L] : Nondegenerate (Dual L) (Dual P) where exists_point := @exists_line P L _ _ exists_line := @exists_point P L _ _ eq_or_eq := @fun l₁ l₂ p₁ p₂ h₁ h₂ h₃ h₄ => (@eq_or_eq P L _ _ p₁ p₂ l₁ l₂ h₁ h₃ h₂ h₄).symm instance Dual.hasLines [HasPoints P L] : HasLines (Dual L) (Dual P) := { Dual.Nondegenerate _ _ with mkLine := @mkPoint P L _ _ mkLine_ax := @mkPoint_ax P L _ _ } instance Dual.hasPoints [HasLines P L] : HasPoints (Dual L) (Dual P) := { Dual.Nondegenerate _ _ with mkPoint := @mkLine P L _ _ mkPoint_ax := @mkLine_ax P L _ _ } theorem HasPoints.existsUnique_point [HasPoints P L] (l₁ l₂ : L) (hl : l₁ ≠ l₂) : ∃! p, p ∈ l₁ ∧ p ∈ l₂ := ⟨mkPoint hl, mkPoint_ax hl, fun _ hp => (eq_or_eq hp.1 (mkPoint_ax hl).1 hp.2 (mkPoint_ax hl).2).resolve_right hl⟩ theorem HasLines.existsUnique_line [HasLines P L] (p₁ p₂ : P) (hp : p₁ ≠ p₂) : ∃! l : L, p₁ ∈ l ∧ p₂ ∈ l := HasPoints.existsUnique_point (Dual L) (Dual P) p₁ p₂ hp variable {P L} /-- If a nondegenerate configuration has at least as many points as lines, then there exists an injective function `f` from lines to points, such that `f l` does not lie on `l`. -/ theorem Nondegenerate.exists_injective_of_card_le [Nondegenerate P L] [Fintype P] [Fintype L] (h : Fintype.card L ≤ Fintype.card P) : ∃ f : L → P, Function.Injective f ∧ ∀ l, f l ∉ l := by classical let t : L → Finset P := fun l => Set.toFinset { p \| p ∉ l } suffices ∀ s : Finset L, #s ≤ (s.biUnion t).card by -- Hall's marriage theorem obtain ⟨f, hf1, hf2⟩ := (Finset.all_card_le_biUnion_card_iff_exists_injective t).mp this exact ⟨f, hf1, fun l => Set.mem_toFinset.mp (hf2 l)⟩ intro s by_cases hs₀ : #s = 0 -- If `s = ∅`, then `#s = 0 ≤ #(s.bUnion t)` · simp_rw [hs₀, zero_le] by_cases hs₁ : #s = 1 -- If `s = {l}`, then pick a point `p ∉ l` · obtain ⟨l, rfl⟩ := Finset.card_eq_one.mp hs₁ obtain ⟨p, hl⟩ := exists_point (P := P) l rw [Finset.card_singleton, Finset.singleton_biUnion, Nat.one_le_iff_ne_zero] exact Finset.card_ne_zero_of_mem (Set.mem_toFinset.mpr hl) suffices #(s.biUnion t)ᶜ ≤ #sᶜ by -- Rephrase in terms of complements (uses `h`) rw [Finset.card_compl, Finset.card_compl, tsub_le_iff_left] at this replace := h.trans this rwa [← add_tsub_assoc_of_le s.card_le_univ, le_tsub_iff_left (le_add_left s.card_le_univ), add_le_add_iff_right] at this have hs₂ : #(s.biUnion t)ᶜ ≤ 1 := by -- At most one line through two points of `s` refine Finset.card_le_one_iff.mpr @fun p₁ p₂ hp₁ hp₂ => ?_ simp_rw [t, Finset.mem_compl, Finset.mem_biUnion, not_exists, not_and, Set.mem_toFinset, Set.mem_setOf_eq, Classical.not_not] at hp₁ hp₂ obtain ⟨l₁, l₂, hl₁, hl₂, hl₃⟩ := Finset.one_lt_card_iff.mp (Nat.one_lt_iff_ne_zero_and_ne_one.mpr ⟨hs₀, hs₁⟩) exact (eq_or_eq (hp₁ l₁ hl₁) (hp₂ l₁ hl₁) (hp₁ l₂ hl₂) (hp₂ l₂ hl₂)).resolve_right hl₃ by_cases hs₃ : #sᶜ = 0 · rw [hs₃, Nat.le_zero] rw [Finset.card_compl, tsub_eq_zero_iff_le, LE.le.le_iff_eq (Finset.card_le_univ _), eq_comm, Finset.card_eq_iff_eq_univ] at hs₃ ⊢ rw [hs₃] rw [Finset.eq_univ_iff_forall] at hs₃ ⊢ exact fun p => Exists.elim (exists_line p)-- If `s = univ`, then show `s.bUnion t = univ` fun l hl => Finset.mem_biUnion.mpr ⟨l, Finset.mem_univ l, Set.mem_toFinset.mpr hl⟩ · exact hs₂.trans (Nat.one_le_iff_ne_zero.mpr hs₃) -- If `s < univ`, then consequence of `hs₂` variable (L) /-- Number of points on a given line. -/ noncomputable def lineCount (p : P) : ℕ := Nat.card { l : L // p ∈ l } variable (P) {L} /-- Number of lines through a given point. -/ noncomputable def pointCount (l : L) : ℕ := Nat.card { p : P // p ∈ l } variable (L) theorem sum_lineCount_eq_sum_pointCount [Fintype P] [Fintype L] : ∑ p : P, lineCount L p = ∑ l : L, pointCount P l := by classical simp only [lineCount, pointCount, Nat.card_eq_fintype_card, ← Fintype.card_sigma] apply Fintype.card_congr calc (Σp, { l : L // p ∈ l }) ≃ { x : P × L // x.1 ∈ x.2 } := (Equiv.subtypeProdEquivSigmaSubtype (· ∈ ·)).symm _ ≃ { x : L × P // x.2 ∈ x.1 } := (Equiv.prodComm P L).subtypeEquiv fun x => Iff.rfl _ ≃ Σl, { p // p ∈ l } := Equiv.subtypeProdEquivSigmaSubtype fun (l : L) (p : P) => p ∈ l variable {P L} theorem HasLines.pointCount_le_lineCount [HasLines P L] {p : P} {l : L} (h : p ∉ l) [Finite { l : L // p ∈ l }] : pointCount P l ≤ lineCount L p := by by_cases hf : Infinite { p : P // p ∈ l } · exact (le_of_eq Nat.card_eq_zero_of_infinite).trans (zero_le (lineCount L p)) haveI := fintypeOfNotInfinite hf cases nonempty_fintype { l : L // p ∈ l } rw [lineCount, pointCount, Nat.card_eq_fintype_card, Nat.card_eq_fintype_card] have : ∀ p' : { p // p ∈ l }, p ≠ p' := fun p' hp' => h ((congr_arg (· ∈ l) hp').mpr p'.2) exact Fintype.card_le_of_injective (fun p' => ⟨mkLine (this p'), (mkLine_ax (this p')).1⟩) fun p₁ p₂ hp => Subtype.ext ((eq_or_eq p₁.2 p₂.2 (mkLine_ax (this p₁)).2 ((congr_arg (_ ∈ ·) (Subtype.ext_iff.mp hp)).mpr (mkLine_ax (this p₂)).2)).resolve_right fun h' => (congr_arg (¬p ∈ ·) h').mp h (mkLine_ax (this p₁)).1) theorem HasPoints.lineCount_le_pointCount [HasPoints P L] {p : P} {l : L} (h : p ∉ l) [hf : Finite { p : P // p ∈ l }] : lineCount L p ≤ pointCount P l := @HasLines.pointCount_le_lineCount (Dual L) (Dual P) _ _ l p h hf variable (P L) /-- If a nondegenerate configuration has a unique line through any two points, then `\|P\| ≤ \|L\|`. -/ theorem HasLines.card_le [HasLines P L] [Fintype P] [Fintype L] : Fintype.card P ≤ Fintype.card L := by classical by_contra hc₂ obtain ⟨f, hf₁, hf₂⟩ := Nondegenerate.exists_injective_of_card_le (le_of_not_le hc₂) have := calc ∑ p, lineCount L p = ∑ l, pointCount P l := sum_lineCount_eq_sum_pointCount P L _ ≤ ∑ l, lineCount L (f l) := (Finset.sum_le_sum fun l _ => HasLines.pointCount_le_lineCount (hf₂ l)) _ = ∑ p ∈ univ.map ⟨f, hf₁⟩, lineCount L p := by rw [sum_map]; dsimp _ < ∑ p, lineCount L p := by obtain ⟨p, hp⟩ := not_forall.mp (mt (Fintype.card_le_of_surjective f) hc₂) refine sum_lt_sum_of_subset (subset_univ _) (mem_univ p) ?_ ?_ fun p _ _ ↦ zero_le _ · simpa only [Finset.mem_map, exists_prop, Finset.mem_univ, true_and] · rw [lineCount, Nat.card_eq_fintype_card, Fintype.card_pos_iff] obtain ⟨l, _⟩ := @exists_line P L _ _ p exact let this := not_exists.mp hp l ⟨⟨mkLine this, (mkLine_ax this).2⟩⟩ exact lt_irrefl _ this /-- If a nondegenerate configuration has a unique point on any two lines, then `\|L\| ≤ \|P\|`. -/ theorem HasPoints.card_le [HasPoints P L] [Fintype P] [Fintype L] : Fintype.card L ≤ Fintype.card P := @HasLines.card_le (Dual L) (Dual P) _ _ _ _ variable {P L} theorem HasLines.exists_bijective_of_card_eq [HasLines P L] [Fintype P] [Fintype L] (h : Fintype.card P = Fintype.card L) : ∃ f : L → P, Function.Bijective f ∧ ∀ l, pointCount P l = lineCount L (f l) := by classical obtain ⟨f, hf1, hf2⟩ := Nondegenerate.exists_injective_of_card_le (ge_of_eq h) have hf3 := (Fintype.bijective_iff_injective_and_card f).mpr ⟨hf1, h.symm⟩ exact ⟨f, hf3, fun l ↦ (sum_eq_sum_iff_of_le fun l _ ↦ pointCount_le_lineCount (hf2 l)).1 ((hf3.sum_comp _).trans (sum_lineCount_eq_sum_pointCount P L)).symm _ <\| mem_univ _⟩ theorem HasLines.lineCount_eq_pointCount [HasLines P L] [Fintype P] [Fintype L] (hPL : Fintype.card P = Fintype.card L) {p : P} {l : L} (hpl : p ∉ l) : lineCount L p = pointCount P l := by classical obtain ⟨f, hf1, hf2⟩ := HasLines.exists_bijective_of_card_eq hPL let s : Finset (P × L) := Set.toFinset { i \| i.1 ∈ i.2 } have step1 : ∑ i : P × L, lineCount L i.1 = ∑ i : P × L, pointCount P i.2 := by rw [← Finset.univ_product_univ, Finset.sum_product_right, Finset.sum_product] simp_rw [Finset.sum_const, Finset.card_univ, hPL, sum_lineCount_eq_sum_pointCount] have step2 : ∑ i ∈ s, lineCount L i.1 = ∑ i ∈ s, pointCount P i.2 := by rw [s.sum_finset_product Finset.univ fun p => Set.toFinset { l \| p ∈ l }] on_goal 1 => rw [s.sum_finset_product_right Finset.univ fun l => Set.toFinset { p \| p ∈ l }, eq_comm] · refine sum_bijective _ hf1 (by simp) fun l _ ↦ ?_ simp_rw [hf2, sum_const, Set.toFinset_card, ← Nat.card_eq_fintype_card] change pointCount P l • _ = lineCount L (f l) • _ rw [hf2] all_goals simp_rw [s, Finset.mem_univ, true_and, Set.mem_toFinset]; exact fun p => Iff.rfl have step3 : ∑ i ∈ sᶜ, lineCount L i.1 = ∑ i ∈ sᶜ, pointCount P i.2 := by rwa [← s.sum_add_sum_compl, ← s.sum_add_sum_compl, step2, add_left_cancel_iff] at step1 rw [← Set.toFinset_compl] at step3 exact ((Finset.sum_eq_sum_iff_of_le fun i hi => HasLines.pointCount_le_lineCount (by exact Set.mem_toFinset.mp hi)).mp step3.symm (p, l) (Set.mem_toFinset.mpr hpl)).symm theorem HasPoints.lineCount_eq_pointCount [HasPoints P L] [Fintype P] [Fintype L] (hPL : Fintype.card P = Fintype.card L) {p : P} {l : L} (hpl : p ∉ l) : lineCount L p = pointCount P l := (@HasLines.lineCount_eq_pointCount (Dual L) (Dual P) _ _ _ _ hPL.symm l p hpl).symm /-- If a nondegenerate configuration has a unique line through any two points, and if `\|P\| = \|L\|`, then there is a unique point on any two lines. -/ noncomputable def HasLines.hasPoints [HasLines P L] [Fintype P] [Fintype L] (h : Fintype.card P = Fintype.card L) : HasPoints P L := let this : ∀ l₁ l₂ : L, l₁ ≠ l₂ → ∃ p : P, p ∈ l₁ ∧ p ∈ l₂ := fun l₁ l₂ hl => by classical obtain ⟨f, _, hf2⟩ := HasLines.exists_bijective_of_card_eq h haveI : Nontrivial L := ⟨⟨l₁, l₂, hl⟩⟩ haveI := Fintype.one_lt_card_iff_nontrivial.mp ((congr_arg _ h).mpr Fintype.one_lt_card) have h₁ : ∀ p : P, 0 < lineCount L p := fun p => Exists.elim (exists_ne p) fun q hq => (congr_arg _ Nat.card_eq_fintype_card).mpr (Fintype.card_pos_iff.mpr ⟨⟨mkLine hq, (mkLine_ax hq).2⟩⟩) have h₂ : ∀ l : L, 0 < pointCount P l := fun l => (congr_arg _ (hf2 l)).mpr (h₁ (f l)) obtain ⟨p, hl₁⟩ := Fintype.card_pos_iff.mp ((congr_arg _ Nat.card_eq_fintype_card).mp (h₂ l₁)) by_cases hl₂ : p ∈ l₂ · exact ⟨p, hl₁, hl₂⟩ have key' : Fintype.card { q : P // q ∈ l₂ } = Fintype.card { l : L // p ∈ l } := ((HasLines.lineCount_eq_pointCount h hl₂).trans Nat.card_eq_fintype_card).symm.trans Nat.card_eq_fintype_card have : ∀ q : { q // q ∈ l₂ }, p ≠ q := fun q hq => hl₂ ((congr_arg (· ∈ l₂) hq).mpr q.2) let f : { q : P // q ∈ l₂ } → { l : L // p ∈ l } := fun q => ⟨mkLine (this q), (mkLine_ax (this q)).1⟩ have hf : Function.Injective f := fun q₁ q₂ hq => Subtype.ext ((eq_or_eq q₁.2 q₂.2 (mkLine_ax (this q₁)).2 ((congr_arg (_ ∈ ·) (Subtype.ext_iff.mp hq)).mpr (mkLine_ax (this q₂)).2)).resolve_right fun h => (congr_arg (¬p ∈ ·) h).mp hl₂ (mkLine_ax (this q₁)).1) have key' := ((Fintype.bijective_iff_injective_and_card f).mpr ⟨hf, key'⟩).2 obtain ⟨q, hq⟩ := key' ⟨l₁, hl₁⟩ exact ⟨q, (congr_arg (_ ∈ ·) (Subtype.ext_iff.mp hq)).mp (mkLine_ax (this q)).2, q.2⟩ { ‹HasLines P L› with mkPoint := fun {l₁ l₂} hl => Classical.choose (this l₁ l₂ hl) mkPoint_ax := fun {l₁ l₂} hl => Classical.choose_spec (this l₁ l₂ hl) } /-- If a nondegenerate configuration has a unique point on any two lines, and if `\|P\| = \|L\|`, then there is a unique line through any two points. -/ noncomputable def HasPoints.hasLines [HasPoints P L] [Fintype P] [Fintype L] (h : Fintype.card P = Fintype.card L) : HasLines P L := let this := @HasLines.hasPoints (Dual L) (Dual P) _ _ _ _ h.symm { ‹HasPoints P L› with mkLine := @fun _ _ => this.mkPoint mkLine_ax := @fun _ _ => this.mkPoint_ax } variable (P L) /-- A projective plane is a nondegenerate configuration in which every pair of lines has an intersection point, every pair of points has a line through them, and which has three points in general position. -/ class ProjectivePlane extends HasPoints P L, HasLines P L where exists_config : ∃ (p₁ p₂ p₃ : P) (l₁ l₂ l₃ : L), p₁ ∉ l₂ ∧ p₁ ∉ l₃ ∧ p₂ ∉ l₁ ∧ p₂ ∈ l₂ ∧ p₂ ∈ l₃ ∧ p₃ ∉ l₁ ∧ p₃ ∈ l₂ ∧ p₃ ∉ l₃ namespace ProjectivePlane variable [ProjectivePlane P L] instance : ProjectivePlane (Dual L) (Dual P) := { Dual.hasPoints _ _, Dual.hasLines _ _ with exists_config := let ⟨p₁, p₂, p₃, l₁, l₂, l₃, h₁₂, h₁₃, h₂₁, h₂₂, h₂₃, h₃₁, h₃₂, h₃₃⟩ := @exists_config P L _ _ ⟨l₁, l₂, l₃, p₁, p₂, p₃, h₂₁, h₃₁, h₁₂, h₂₂, h₃₂, h₁₃, h₂₃, h₃₃⟩ } /-- The order of a projective plane is one less than the number of lines through an arbitrary point. Equivalently, it is one less than the number of points on an arbitrary line. -/ noncomputable def order : ℕ := lineCount L (Classical.choose (@exists_config P L _ _)) - 1 theorem card_points_eq_card_lines [Fintype P] [Fintype L] : Fintype.card P = Fintype.card L := le_antisymm (HasLines.card_le P L) (HasPoints.card_le P L) variable {P} theorem lineCount_eq_lineCount [Finite P] [Finite L] (p q : P) : lineCount L p = lineCount L q := by cases nonempty_fintype P cases nonempty_fintype L obtain ⟨p₁, p₂, p₃, l₁, l₂, l₃, h₁₂, h₁₃, h₂₁, h₂₂, h₂₃, h₃₁, h₃₂, h₃₃⟩ := @exists_config P L _ _ have h := card_points_eq_card_lines P L let n := lineCount L p₂ have hp₂ : lineCount L p₂ = n := rfl have hl₁ : pointCount P l₁ = n := (HasLines.lineCount_eq_pointCount h h₂₁).symm.trans hp₂ have hp₃ : lineCount L p₃ = n := (HasLines.lineCount_eq_pointCount h h₃₁).trans hl₁ have hl₃ : pointCount P l₃ = n := (HasLines.lineCount_eq_pointCount h h₃₃).symm.trans hp₃ have hp₁ : lineCount L p₁ = n := (HasLines.lineCount_eq_pointCount h h₁₃).trans hl₃ have hl₂ : pointCount P l₂ = n := (HasLines.lineCount_eq_pointCount h h₁₂).symm.trans hp₁ suffices ∀ p : P, lineCount L p = n by exact (this p).trans (this q).symm refine fun p => or_not.elim (fun h₂ => ?_) fun h₂ => (HasLines.lineCount_eq_pointCount h h₂).trans hl₂ refine or_not.elim (fun h₃ => ?_) fun h₃ => (HasLines.lineCount_eq_pointCount h h₃).trans hl₃ rw [(eq_or_eq h₂ h₂₂ h₃ h₂₃).resolve_right fun h => h₃₃ ((congr_arg (p₃ ∈ ·) h).mp h₃₂)] variable (P) {L} theorem pointCount_eq_pointCount [Finite P] [Finite L] (l m : L) : pointCount P l = pointCount P m := by apply lineCount_eq_lineCount (Dual P) variable {P} theorem lineCount_eq_pointCount [Finite P] [Finite L] (p : P) (l : L) : lineCount L p = pointCount P l := Exists.elim (exists_point l) fun q hq => (lineCount_eq_lineCount L p q).trans <\| by cases nonempty_fintype P cases nonempty_fintype L exact HasLines.lineCount_eq_pointCount (card_points_eq_card_lines P L) hq variable (P L) theorem Dual.order [Finite P] [Finite L] : order (Dual L) (Dual P) = order P L := congr_arg (fun n => n - 1) (lineCount_eq_pointCount _ _) variable {P} theorem lineCount_eq [Finite P] [Finite L] (p : P) : lineCount L p = order P L + 1 := by classical obtain ⟨q, -, -, l, -, -, -, -, h, -⟩ := Classical.choose_spec (@exists_config P L _ _) cases nonempty_fintype { l : L // q ∈ l } rw [order, lineCount_eq_lineCount L p q, lineCount_eq_lineCount L (Classical.choose _) q, lineCount, Nat.card_eq_fintype_card, Nat.sub_add_cancel] exact Fintype.card_pos_iff.mpr ⟨⟨l, h⟩⟩ variable (P) {L} theorem pointCount_eq [Finite P] [Finite L] (l : L) : pointCount P l = order P L + 1 := (lineCount_eq (Dual P) _).trans (congr_arg (fun n => n + 1) (Dual.order P L)) variable (L) theorem one_lt_order [Finite P] [Finite L] : 1 < order P L := by obtain ⟨p₁, p₂, p₃, l₁, l₂, l₃, -, -, h₂₁, h₂₂, h₂₃, h₃₁, h₃₂, h₃₃⟩ := @exists_config P L _ _ cases nonempty_fintype { p : P // p ∈ l₂ } rw [← add_lt_add_iff_right 1, ← pointCount_eq _ l₂, pointCount, Nat.card_eq_fintype_card, Fintype.two_lt_card_iff] simp_rw [Ne, Subtype.ext_iff] have h := mkPoint_ax (P := P) (L := L) fun h => h₂₁ ((congr_arg (p₂ ∈ ·) h).mpr h₂₂) exact ⟨⟨mkPoint _, h.2⟩, ⟨p₂, h₂₂⟩, ⟨p₃, h₃₂⟩, ne_of_mem_of_not_mem h.1 h₂₁, ne_of_mem_of_not_mem h.1 h₃₁, ne_of_mem_of_not_mem h₂₃ h₃₃⟩ variable {P} theorem two_lt_lineCount [Finite P] [Finite L] (p : P) : 2 < lineCount L p := by simpa only [lineCount_eq L p, Nat.succ_lt_succ_iff] using one_lt_order P L variable (P) {L} theorem two_lt_pointCount [Finite P] [Finite L] (l : L) : 2 < pointCount P l := by simpa only [pointCount_eq P l, Nat.succ_lt_succ_iff] using one_lt_order P L variable (L) theorem card_points [Fintype P] [Finite L] : Fintype.card P = order P L ^ 2 + order P L + 1 := by cases nonempty_fintype L obtain ⟨p, -⟩ := @exists_config P L _ _ let ϕ : { q // q ≠ p } ≃ Σl : { l : L // p ∈ l }, { q // q ∈ l.1 ∧ q ≠ p } := { toFun := fun q => ⟨⟨mkLine q.2, (mkLine_ax q.2).2⟩, q, (mkLine_ax q.2).1, q.2⟩ invFun := fun lq => ⟨lq.2, lq.2.2.2⟩ left_inv := fun q => Subtype.ext rfl right_inv := fun lq => Sigma.subtype_ext (Subtype.ext ((eq_or_eq (mkLine_ax lq.2.2.2).1 (mkLine_ax lq.2.2.2).2 lq.2.2.1 lq.1.2).resolve_left lq.2.2.2)) rfl } classical have h1 : Fintype.card { q // q ≠ p } + 1 = Fintype.card P := by apply (eq_tsub_iff_add_eq_of_le (Nat.succ_le_of_lt (Fintype.card_pos_iff.mpr ⟨p⟩))).mp convert (Fintype.card_subtype_compl _).trans (congr_arg _ (Fintype.card_subtype_eq p)) have h2 : ∀ l : { l : L // p ∈ l }, Fintype.card { q // q ∈ l.1 ∧ q ≠ p } = order P L := by intro l rw [← Fintype.card_congr (Equiv.subtypeSubtypeEquivSubtypeInter (· ∈ l.val) (· ≠ p)), Fintype.card_subtype_compl fun x : Subtype (· ∈ l.val) => x.val = p, ← Nat.card_eq_fintype_card] refine tsub_eq_of_eq_add ((pointCount_eq P l.1).trans ?_) rw [← Fintype.card_subtype_eq (⟨p, l.2⟩ : { q : P // q ∈ l.1 })] simp_rw [Subtype.ext_iff_val] simp_rw [← h1, Fintype.card_congr ϕ, Fintype.card_sigma, h2, Finset.sum_const, Finset.card_univ] rw [← Nat.card_eq_fintype_card, ← lineCount, lineCount_eq, smul_eq_mul, Nat.succ_mul, sq] theorem card_lines [Finite P] [Fintype L] : Fintype.card L = order P L ^ 2 + order P L + 1 := (card_points (Dual L) (Dual P)).trans (congr_arg (fun n => n ^ 2 + n + 1) (Dual.order P L)) end ProjectivePlane namespace ofField variable {K : Type} [Field K]	open scoped LinearAlgebra.Projectivization open Matrix Projectivization instance : Membership (ℙ K (Fin 3 → K)) (ℙ K (Fin 3 → K)) := ⟨Function.swap orthogonal⟩ lemma mem_iff (v w : ℙ K (Fin 3 → K)) : v ∈ w ↔ orthogonal v w := Iff.rfl -- This lemma can't be moved to the crossProduct file due to heavy imports lemma crossProduct_eq_zero_of_dotProduct_eq_zero {a b c d : Fin 3 → K} (hac : dotProduct a c = 0) (hbc : dotProduct b c = 0) (had : dotProduct a d = 0) (hbd : dotProduct b d = 0) : crossProduct a b = 0 ∨ crossProduct c d = 0 := by by_contra h simp_rw [not_or, ← ne_eq, crossProduct_ne_zero_iff_linearIndependent] at h rw [← Matrix.of_row (![a,b]), ← Matrix.of_row (![c,d])] at h let A : Matrix (Fin 2) (Fin 3) K := .of ![a, b] let B : Matrix (Fin 2) (Fin 3) K := .of ![c, d] have hAB : A * B.transpose = 0 := by ext i j fin_cases i <;> fin_cases j <;> assumption replace hAB := rank_add_rank_le_card_of_mul_eq_zero hAB rw [rank_transpose, h.1.rank_matrix, h.2.rank_matrix, Fintype.card_fin, Fintype.card_fin] at hAB contradiction lemma eq_or_eq_of_orthogonal {a b c d : ℙ K (Fin 3 → K)} (hac : a.orthogonal c)	Mathlib/Combinatorics/Configuration.lean	467	493
/- Copyright (c) 2022 Oliver Nash. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Oliver Nash -/ import Mathlib.Analysis.Normed.Group.Quotient import Mathlib.Analysis.NormedSpace.Pointwise import Mathlib.Topology.Instances.AddCircle /-! # The additive circle as a normed group We define the normed group structure on `AddCircle p`, for `p : ℝ`. For example if `p = 1` then: `‖(x : AddCircle 1)‖ = \|x - round x\|` for any `x : ℝ` (see `UnitAddCircle.norm_eq`). ## Main definitions: * `AddCircle.norm_eq`: a characterisation of the norm on `AddCircle p` ## TODO * The fact `InnerProductGeometry.angle (Real.cos θ) (Real.sin θ) = ‖(θ : Real.Angle)‖` -/ noncomputable section open Metric QuotientAddGroup Set open Int hiding mem_zmultiples_iff open AddSubgroup namespace AddCircle variable (p : ℝ) instance : NormedAddCommGroup (AddCircle p) := QuotientAddGroup.instNormedAddCommGroup _ @[simp] theorem norm_coe_mul (x : ℝ) (t : ℝ) : ‖(↑(t * x) : AddCircle (t * p))‖ = \|t\| * ‖(x : AddCircle p)‖ := by obtain rfl \| ht := eq_or_ne t 0 · simp simp only [norm_eq_infDist, Real.norm_eq_abs, ← Real.norm_eq_abs, ← infDist_smul₀ ht, smul_zero] congr with m simp only [zmultiples, eq_iff_sub_mem, zsmul_eq_mul, mem_mk, mem_setOf_eq, mem_smul_set_iff_inv_smul_mem₀ ht, smul_eq_mul] simp_rw [mul_left_comm, ← smul_eq_mul, Set.range_smul, mem_smul_set_iff_inv_smul_mem₀ ht] simp [mul_sub, ht, -mem_range] theorem norm_neg_period (x : ℝ) : ‖(x : AddCircle (-p))‖ = ‖(x : AddCircle p)‖ := by suffices ‖(↑(-1 * x) : AddCircle (-1 * p))‖ = ‖(x : AddCircle p)‖ by rw [← this, neg_one_mul] simp simp only [norm_coe_mul, abs_neg, abs_one, one_mul] @[simp] theorem norm_eq_of_zero {x : ℝ} : ‖(x : AddCircle (0 : ℝ))‖ = \|x\| := by suffices { y : ℝ \| (y : AddCircle (0 : ℝ)) = (x : AddCircle (0 : ℝ)) } = {x} by simp [norm_eq_infDist, this] ext y simp [eq_iff_sub_mem, mem_zmultiples_iff, sub_eq_zero] theorem norm_eq {x : ℝ} : ‖(x : AddCircle p)‖ = \|x - round (p⁻¹ * x) * p\| := by suffices ∀ x : ℝ, ‖(x : AddCircle (1 : ℝ))‖ = \|x - round x\| by rcases eq_or_ne p 0 with (rfl \| hp) · simp have hx := norm_coe_mul p x p⁻¹ rw [abs_inv, eq_inv_mul_iff_mul_eq₀ ((not_congr abs_eq_zero).mpr hp)] at hx rw [← hx, inv_mul_cancel₀ hp, this, ← abs_mul, mul_sub, mul_inv_cancel_left₀ hp, mul_comm p] clear! x p intros x simp only [le_antisymm_iff, le_norm_iff, Real.norm_eq_abs] refine ⟨le_of_forall_le fun r hr ↦ ?_, ?_⟩ · rw [abs_sub_round_eq_min, le_inf_iff] rw [le_norm_iff] at hr constructor · simpa [abs_of_nonneg] using hr (fract x) · simpa [abs_sub_comm (fract x)] using hr (fract x - 1) (by simp [← self_sub_floor, ← sub_eq_zero, sub_sub]; simp) · simpa [zmultiples, QuotientAddGroup.eq, zsmul_eq_mul, mul_one, mem_mk, mem_range, and_imp, forall_exists_index, eq_neg_add_iff_add_eq, ← eq_sub_iff_add_eq, forall_swap (α := ℕ)] using round_le _ theorem norm_eq' (hp : 0 < p) {x : ℝ} : ‖(x : AddCircle p)‖ = p * \|p⁻¹ * x - round (p⁻¹ * x)\| := by conv_rhs => congr rw [← abs_eq_self.mpr hp.le] rw [← abs_mul, mul_sub, mul_inv_cancel_left₀ hp.ne.symm, norm_eq, mul_comm p] theorem norm_le_half_period {x : AddCircle p} (hp : p ≠ 0) : ‖x‖ ≤ \|p\| / 2 := by obtain ⟨x⟩ := x change ‖(x : AddCircle p)‖ ≤ \|p\| / 2 rw [norm_eq, ← mul_le_mul_left (abs_pos.mpr (inv_ne_zero hp)), ← abs_mul, mul_sub, mul_left_comm, ← mul_div_assoc, ← abs_mul, inv_mul_cancel₀ hp, mul_one, abs_one] exact abs_sub_round (p⁻¹ * x) @[simp] theorem norm_half_period_eq : ‖(↑(p / 2) : AddCircle p)‖ = \|p\| / 2 := by rcases eq_or_ne p 0 with (rfl \| hp); · simp rw [norm_eq, ← mul_div_assoc, inv_mul_cancel₀ hp, one_div, round_two_inv, Int.cast_one, one_mul, (by linarith : p / 2 - p = -(p / 2)), abs_neg, abs_div, abs_two] theorem norm_coe_eq_abs_iff {x : ℝ} (hp : p ≠ 0) : ‖(x : AddCircle p)‖ = \|x\| ↔ \|x\| ≤ \|p\| / 2 := by refine ⟨fun hx => hx ▸ norm_le_half_period p hp, fun hx => ?_⟩ suffices ∀ p : ℝ, 0 < p → \|x\| ≤ p / 2 → ‖(x : AddCircle p)‖ = \|x\| by rcases hp.symm.lt_or_lt with (hp \| hp) · rw [abs_eq_self.mpr hp.le] at hx exact this p hp hx · rw [← norm_neg_period] rw [abs_eq_neg_self.mpr hp.le] at hx exact this (-p) (neg_pos.mpr hp) hx clear hx intro p hp hx rcases eq_or_ne x (p / (2 : ℝ)) with (rfl \| hx') · simp [abs_div, abs_two] suffices round (p⁻¹ * x) = 0 by simp [norm_eq, this] rw [round_eq_zero_iff] obtain ⟨hx₁, hx₂⟩ := abs_le.mp hx replace hx₂ := Ne.lt_of_le hx' hx₂ constructor · rwa [← mul_le_mul_left hp, ← mul_assoc, mul_inv_cancel₀ hp.ne.symm, one_mul, mul_neg, ← mul_div_assoc, mul_one] · rwa [← mul_lt_mul_left hp, ← mul_assoc, mul_inv_cancel₀ hp.ne.symm, one_mul, ← mul_div_assoc, mul_one] open Metric theorem closedBall_eq_univ_of_half_period_le (hp : p ≠ 0) (x : AddCircle p) {ε : ℝ} (hε : \|p\| / 2 ≤ ε) : closedBall x ε = univ := eq_univ_iff_forall.mpr fun x => by simpa only [mem_closedBall, dist_eq_norm] using (norm_le_half_period p hp).trans hε @[simp] theorem coe_real_preimage_closedBall_period_zero (x ε : ℝ) : (↑) ⁻¹' closedBall (x : AddCircle (0 : ℝ)) ε = closedBall x ε := by ext y simp [dist_eq_norm, ← QuotientAddGroup.mk_sub] theorem coe_real_preimage_closedBall_eq_iUnion (x ε : ℝ) : (↑) ⁻¹' closedBall (x : AddCircle p) ε = ⋃ z : ℤ, closedBall (x + z • p) ε := by rcases eq_or_ne p 0 with (rfl \| hp) · simp [iUnion_const] ext y simp only [dist_eq_norm, mem_preimage, mem_closedBall, zsmul_eq_mul, mem_iUnion, Real.norm_eq_abs, ← QuotientAddGroup.mk_sub, norm_eq, ← sub_sub] refine ⟨fun h => ⟨round (p⁻¹ * (y - x)), h⟩, ?_⟩ rintro ⟨n, hn⟩ rw [← mul_le_mul_left (abs_pos.mpr <\| inv_ne_zero hp), ← abs_mul, mul_sub, mul_comm _ p, inv_mul_cancel_left₀ hp] at hn ⊢ exact (round_le (p⁻¹ * (y - x)) n).trans hn theorem coe_real_preimage_closedBall_inter_eq {x ε : ℝ} (s : Set ℝ) (hs : s ⊆ closedBall x (\|p\| / 2)) : (↑) ⁻¹' closedBall (x : AddCircle p) ε ∩ s = if ε < \|p\| / 2 then closedBall x ε ∩ s else s := by rcases le_or_lt (\|p\| / 2) ε with hε \| hε · rcases eq_or_ne p 0 with (rfl \| hp) · simp only [abs_zero, zero_div] at hε simp only [not_lt.mpr hε, coe_real_preimage_closedBall_period_zero, abs_zero, zero_div, if_false, inter_eq_right] exact hs.trans (closedBall_subset_closedBall <\| by simp [hε]) simp [closedBall_eq_univ_of_half_period_le p hp (↑x) hε, not_lt.mpr hε] · suffices ∀ z : ℤ, closedBall (x + z • p) ε ∩ s = if z = 0 then closedBall x ε ∩ s else ∅ by simp [-zsmul_eq_mul, ← QuotientAddGroup.mk_zero, coe_real_preimage_closedBall_eq_iUnion, iUnion_inter, iUnion_ite, this, hε] intro z simp only [Real.closedBall_eq_Icc, zero_sub, zero_add] at hs ⊢ rcases eq_or_ne z 0 with (rfl \| hz) · simp simp only [hz, zsmul_eq_mul, if_false, eq_empty_iff_forall_not_mem] rintro y ⟨⟨hy₁, hy₂⟩, hy₀⟩ obtain ⟨hy₃, hy₄⟩ := hs hy₀ rcases lt_trichotomy 0 p with (hp \| (rfl : 0 = p) \| hp) · rcases Int.cast_le_neg_one_or_one_le_cast_of_ne_zero ℝ hz with hz' \| hz' · have : ↑z * p ≤ -p := by nlinarith linarith [abs_eq_self.mpr hp.le] · have : p ≤ ↑z * p := by nlinarith linarith [abs_eq_self.mpr hp.le] · simp only [mul_zero, add_zero, abs_zero, zero_div] at hy₁ hy₂ hε linarith · rcases Int.cast_le_neg_one_or_one_le_cast_of_ne_zero ℝ hz with hz' \| hz' · have : -p ≤ ↑z * p := by nlinarith linarith [abs_eq_neg_self.mpr hp.le] · have : ↑z * p ≤ p := by nlinarith linarith [abs_eq_neg_self.mpr hp.le] section FiniteOrderPoints variable {p} [hp : Fact (0 < p)] theorem norm_div_natCast {m n : ℕ} : ‖(↑(↑m / ↑n * p) : AddCircle p)‖ = p * (↑(min (m % n) (n - m % n)) / n) := by have : p⁻¹ * (↑m / ↑n * p) = ↑m / ↑n := by rw [mul_comm _ p, inv_mul_cancel_left₀ hp.out.ne.symm] rw [norm_eq' p hp.out, this, abs_sub_round_div_natCast_eq] theorem exists_norm_eq_of_isOfFinAddOrder {u : AddCircle p} (hu : IsOfFinAddOrder u) : ∃ k : ℕ, ‖u‖ = p * (k / addOrderOf u) := by let n := addOrderOf u change ∃ k : ℕ, ‖u‖ = p * (k / n) obtain ⟨m, -, -, hm⟩ := exists_gcd_eq_one_of_isOfFinAddOrder hu refine ⟨min (m % n) (n - m % n), ?_⟩ rw [← hm, norm_div_natCast] theorem le_add_order_smul_norm_of_isOfFinAddOrder {u : AddCircle p} (hu : IsOfFinAddOrder u) (hu' : u ≠ 0) : p ≤ addOrderOf u • ‖u‖ := by obtain ⟨n, hn⟩ := exists_norm_eq_of_isOfFinAddOrder hu replace hu : (addOrderOf u : ℝ) ≠ 0 := by norm_cast exact (addOrderOf_pos_iff.mpr hu).ne' conv_lhs => rw [← mul_one p] rw [hn, nsmul_eq_mul, ← mul_assoc, mul_comm _ p, mul_assoc, mul_div_cancel₀ _ hu, mul_le_mul_left hp.out, Nat.one_le_cast, Nat.one_le_iff_ne_zero] contrapose! hu' simpa only [hu', Nat.cast_zero, zero_div, mul_zero, norm_eq_zero] using hn end FiniteOrderPoints end AddCircle namespace UnitAddCircle theorem norm_eq {x : ℝ} : ‖(x : UnitAddCircle)‖ = \|x - round x\| := by simp [AddCircle.norm_eq] end UnitAddCircle		Mathlib/Analysis/Normed/Group/AddCircle.lean	278	278
/- Copyright (c) 2018 Mario Carneiro. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro, Johannes Hölzl -/ import Mathlib.MeasureTheory.Integral.Lebesgue.Basic import Mathlib.MeasureTheory.Integral.Lebesgue.Countable import Mathlib.MeasureTheory.Integral.Lebesgue.MeasurePreserving import Mathlib.MeasureTheory.Integral.Lebesgue.Norm deprecated_module (since := "2025-04-13")		Mathlib/MeasureTheory/Integral/Lebesgue.lean	935	940
/- 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] \| cons d₁ t₁ ih => rw [List.cons_append, idxOf_cons_ne _ (ne_of_not_mem_cons h).symm, List.length, ih (not_mem_of_not_mem_cons h), Nat.succ_add] @[deprecated (since := "2025-01-30")] alias indexOf_append_of_not_mem := idxOf_append_of_not_mem end IndexOf /-! ### nth element -/ section deprecated @[simp] theorem getElem?_length (l : List α) : l[l.length]? = none := getElem?_eq_none le_rfl /-- A version of `getElem_map` that can be used for rewriting. -/ theorem getElem_map_rev (f : α → β) {l} {n : Nat} {h : n < l.length} : f l[n] = (map f l)[n]'((l.length_map f).symm ▸ h) := Eq.symm (getElem_map _) theorem get_length_sub_one {l : List α} (h : l.length - 1 < l.length) : l.get ⟨l.length - 1, h⟩ = l.getLast (by rintro rfl; exact Nat.lt_irrefl 0 h) := (getLast_eq_getElem _).symm theorem take_one_drop_eq_of_lt_length {l : List α} {n : ℕ} (h : n < l.length) : (l.drop n).take 1 = [l.get ⟨n, h⟩] := by rw [drop_eq_getElem_cons h, take, take] simp theorem ext_getElem?' {l₁ l₂ : List α} (h' : ∀ n < max l₁.length l₂.length, l₁[n]? = l₂[n]?) : l₁ = l₂ := by apply ext_getElem? intro n rcases Nat.lt_or_ge n <\| max l₁.length l₂.length with hn \| hn · exact h' n hn · simp_all [Nat.max_le, getElem?_eq_none] @[deprecated (since := "2025-02-15")] alias ext_get?' := ext_getElem?' @[deprecated (since := "2025-02-15")] alias ext_get?_iff := List.ext_getElem?_iff theorem ext_get_iff {l₁ l₂ : List α} : l₁ = l₂ ↔ l₁.length = l₂.length ∧ ∀ n h₁ h₂, get l₁ ⟨n, h₁⟩ = get l₂ ⟨n, h₂⟩ := by constructor · rintro rfl exact ⟨rfl, fun _ _ _ ↦ rfl⟩ · intro ⟨h₁, h₂⟩ exact ext_get h₁ h₂ theorem ext_getElem?_iff' {l₁ l₂ : List α} : l₁ = l₂ ↔ ∀ n < max l₁.length l₂.length, l₁[n]? = l₂[n]? := ⟨by rintro rfl _ _; rfl, ext_getElem?'⟩ @[deprecated (since := "2025-02-15")] alias ext_get?_iff' := ext_getElem?_iff' /-- If two lists `l₁` and `l₂` are the same length and `l₁[n]! = l₂[n]!` for all `n`, then the lists are equal. -/ theorem ext_getElem! [Inhabited α] (hl : length l₁ = length l₂) (h : ∀ n : ℕ, l₁[n]! = l₂[n]!) : l₁ = l₂ := ext_getElem hl fun n h₁ h₂ ↦ by simpa only [← getElem!_pos] using h n @[simp] theorem getElem_idxOf [DecidableEq α] {a : α} : ∀ {l : List α} (h : idxOf a l < l.length), l[idxOf a l] = a \| b :: l, h => by by_cases h' : b = a <;> simp [h', if_pos, if_false, getElem_idxOf] @[deprecated (since := "2025-01-30")] alias getElem_indexOf := getElem_idxOf -- This is incorrectly named and should be `get_idxOf`; -- this already exists, so will require a deprecation dance. theorem idxOf_get [DecidableEq α] {a : α} {l : List α} (h) : get l ⟨idxOf a l, h⟩ = a := by simp @[deprecated (since := "2025-01-30")] alias indexOf_get := idxOf_get @[simp] theorem getElem?_idxOf [DecidableEq α] {a : α} {l : List α} (h : a ∈ l) : l[idxOf a l]? = some a := by rw [getElem?_eq_getElem, getElem_idxOf (idxOf_lt_length_iff.2 h)] @[deprecated (since := "2025-01-30")] alias getElem?_indexOf := getElem?_idxOf @[deprecated (since := "2025-02-15")] alias idxOf_get? := getElem?_idxOf @[deprecated (since := "2025-01-30")] alias indexOf_get? := getElem?_idxOf theorem idxOf_inj [DecidableEq α] {l : List α} {x y : α} (hx : x ∈ l) (hy : y ∈ l) : idxOf x l = idxOf y l ↔ x = y := ⟨fun h => by have x_eq_y : get l ⟨idxOf x l, idxOf_lt_length_iff.2 hx⟩ = get l ⟨idxOf y l, idxOf_lt_length_iff.2 hy⟩ := by simp only [h] simp only [idxOf_get] at x_eq_y; exact x_eq_y, fun h => by subst h; rfl⟩ @[deprecated (since := "2025-01-30")] alias indexOf_inj := idxOf_inj theorem get_reverse' (l : List α) (n) (hn') : l.reverse.get n = l.get ⟨l.length - 1 - n, hn'⟩ := by simp theorem eq_cons_of_length_one {l : List α} (h : l.length = 1) : l = [l.get ⟨0, by omega⟩] := by refine ext_get (by convert h) fun n h₁ h₂ => ?_ simp congr omega end deprecated @[simp] theorem getElem_set_of_ne {l : List α} {i j : ℕ} (h : i ≠ j) (a : α) (hj : j < (l.set i a).length) : (l.set i a)[j] = l[j]'(by simpa using hj) := by rw [← Option.some_inj, ← List.getElem?_eq_getElem, List.getElem?_set_ne h, List.getElem?_eq_getElem] /-! ### map -/ -- `List.map_const` (the version with `Function.const` instead of a lambda) is already tagged -- `simp` in Core -- TODO: Upstream the tagging to Core? attribute [simp] map_const' theorem flatMap_pure_eq_map (f : α → β) (l : List α) : l.flatMap (pure ∘ f) = map f l := .symm <\| map_eq_flatMap .. theorem flatMap_congr {l : List α} {f g : α → List β} (h : ∀ x ∈ l, f x = g x) : l.flatMap f = l.flatMap g := (congr_arg List.flatten <\| map_congr_left h :) theorem infix_flatMap_of_mem {a : α} {as : List α} (h : a ∈ as) (f : α → List α) : f a <:+: as.flatMap f := infix_of_mem_flatten (mem_map_of_mem h) @[simp] theorem map_eq_map {α β} (f : α → β) (l : List α) : f <$> l = map f l := rfl /-- A single `List.map` of a composition of functions is equal to composing a `List.map` with another `List.map`, fully applied. This is the reverse direction of `List.map_map`. -/ theorem comp_map (h : β → γ) (g : α → β) (l : List α) : map (h ∘ g) l = map h (map g l) := map_map.symm /-- Composing a `List.map` with another `List.map` is equal to a single `List.map` of composed functions. -/ @[simp] theorem map_comp_map (g : β → γ) (f : α → β) : map g ∘ map f = map (g ∘ f) := by ext l; rw [comp_map, Function.comp_apply] section map_bijectivity theorem _root_.Function.LeftInverse.list_map {f : α → β} {g : β → α} (h : LeftInverse f g) : LeftInverse (map f) (map g) \| [] => by simp_rw [map_nil] \| x :: xs => by simp_rw [map_cons, h x, h.list_map xs] nonrec theorem _root_.Function.RightInverse.list_map {f : α → β} {g : β → α} (h : RightInverse f g) : RightInverse (map f) (map g) := h.list_map nonrec theorem _root_.Function.Involutive.list_map {f : α → α} (h : Involutive f) : Involutive (map f) := Function.LeftInverse.list_map h @[simp] theorem map_leftInverse_iff {f : α → β} {g : β → α} : LeftInverse (map f) (map g) ↔ LeftInverse f g := ⟨fun h x => by injection h [x], (·.list_map)⟩ @[simp] theorem map_rightInverse_iff {f : α → β} {g : β → α} : RightInverse (map f) (map g) ↔ RightInverse f g := map_leftInverse_iff @[simp] theorem map_involutive_iff {f : α → α} : Involutive (map f) ↔ Involutive f := map_leftInverse_iff theorem _root_.Function.Injective.list_map {f : α → β} (h : Injective f) : Injective (map f) \| [], [], _ => rfl \| x :: xs, y :: ys, hxy => by injection hxy with hxy hxys rw [h hxy, h.list_map hxys] @[simp] theorem map_injective_iff {f : α → β} : Injective (map f) ↔ Injective f := by refine ⟨fun h x y hxy => ?_, (·.list_map)⟩ suffices [x] = [y] by simpa using this apply h simp [hxy] theorem _root_.Function.Surjective.list_map {f : α → β} (h : Surjective f) : Surjective (map f) := let ⟨_, h⟩ := h.hasRightInverse; h.list_map.surjective @[simp] theorem map_surjective_iff {f : α → β} : Surjective (map f) ↔ Surjective f := by refine ⟨fun h x => ?_, (·.list_map)⟩ let ⟨[y], hxy⟩ := h [x] exact ⟨_, List.singleton_injective hxy⟩ theorem _root_.Function.Bijective.list_map {f : α → β} (h : Bijective f) : Bijective (map f) := ⟨h.1.list_map, h.2.list_map⟩ @[simp] theorem map_bijective_iff {f : α → β} : Bijective (map f) ↔ Bijective f := by simp_rw [Function.Bijective, map_injective_iff, map_surjective_iff] end map_bijectivity theorem eq_of_mem_map_const {b₁ b₂ : β} {l : List α} (h : b₁ ∈ map (const α b₂) l) : b₁ = b₂ := by rw [map_const] at h; exact eq_of_mem_replicate h /-- `eq_nil_or_concat` in simp normal form -/ lemma eq_nil_or_concat' (l : List α) : l = [] ∨ ∃ L b, l = L ++ [b] := by simpa using l.eq_nil_or_concat /-! ### foldl, foldr -/ theorem foldl_ext (f g : α → β → α) (a : α) {l : List β} (H : ∀ a : α, ∀ b ∈ l, f a b = g a b) : foldl f a l = foldl g a l := by induction l generalizing a with \| nil => rfl \| cons hd tl ih => unfold foldl rw [ih _ fun a b bin => H a b <\| mem_cons_of_mem _ bin, H a hd mem_cons_self] theorem foldr_ext (f g : α → β → β) (b : β) {l : List α} (H : ∀ a ∈ l, ∀ b : β, f a b = g a b) : foldr f b l = foldr g b l := by induction l with \| nil => rfl \| cons hd tl ih => ?_ simp only [mem_cons, or_imp, forall_and, forall_eq] at H simp only [foldr, ih H.2, H.1] theorem foldl_concat (f : β → α → β) (b : β) (x : α) (xs : List α) : List.foldl f b (xs ++ [x]) = f (List.foldl f b xs) x := by simp only [List.foldl_append, List.foldl] theorem foldr_concat (f : α → β → β) (b : β) (x : α) (xs : List α) : List.foldr f b (xs ++ [x]) = (List.foldr f (f x b) xs) := by simp only [List.foldr_append, List.foldr] theorem foldl_fixed' {f : α → β → α} {a : α} (hf : ∀ b, f a b = a) : ∀ l : List β, foldl f a l = a \| [] => rfl \| b :: l => by rw [foldl_cons, hf b, foldl_fixed' hf l] theorem foldr_fixed' {f : α → β → β} {b : β} (hf : ∀ a, f a b = b) : ∀ l : List α, foldr f b l = b \| [] => rfl \| a :: l => by rw [foldr_cons, foldr_fixed' hf l, hf a] @[simp] theorem foldl_fixed {a : α} : ∀ l : List β, foldl (fun a _ => a) a l = a := foldl_fixed' fun _ => rfl @[simp] theorem foldr_fixed {b : β} : ∀ l : List α, foldr (fun _ b => b) b l = b := foldr_fixed' fun _ => rfl @[deprecated foldr_cons_nil (since := "2025-02-10")] theorem foldr_eta (l : List α) : foldr cons [] l = l := foldr_cons_nil theorem reverse_foldl {l : List α} : reverse (foldl (fun t h => h :: t) [] l) = l := by simp theorem foldl_hom₂ (l : List ι) (f : α → β → γ) (op₁ : α → ι → α) (op₂ : β → ι → β) (op₃ : γ → ι → γ) (a : α) (b : β) (h : ∀ a b i, f (op₁ a i) (op₂ b i) = op₃ (f a b) i) : foldl op₃ (f a b) l = f (foldl op₁ a l) (foldl op₂ b l) := Eq.symm <\| by revert a b induction l <;> intros <;> [rfl; simp only [, foldl]] theorem foldr_hom₂ (l : List ι) (f : α → β → γ) (op₁ : ι → α → α) (op₂ : ι → β → β) (op₃ : ι → γ → γ) (a : α) (b : β) (h : ∀ a b i, f (op₁ i a) (op₂ i b) = op₃ i (f a b)) : foldr op₃ (f a b) l = f (foldr op₁ a l) (foldr op₂ b l) := by revert a induction l <;> intros <;> [rfl; simp only [, foldr]] theorem injective_foldl_comp {l : List (α → α)} {f : α → α} (hl : ∀ f ∈ l, Function.Injective f) (hf : Function.Injective f) : Function.Injective (@List.foldl (α → α) (α → α) Function.comp f l) := by induction l generalizing f with \| nil => exact hf \| cons lh lt l_ih => apply l_ih fun _ h => hl _ (List.mem_cons_of_mem _ h) apply Function.Injective.comp hf apply hl _ mem_cons_self /-- Consider two lists `l₁` and `l₂` with designated elements `a₁` and `a₂` somewhere in them: `l₁ = x₁ ++ [a₁] ++ z₁` and `l₂ = x₂ ++ [a₂] ++ z₂`. Assume the designated element `a₂` is present in neither `x₁` nor `z₁`. We conclude that the lists are equal (`l₁ = l₂`) if and only if their respective parts are equal (`x₁ = x₂ ∧ a₁ = a₂ ∧ z₁ = z₂`). -/ lemma append_cons_inj_of_not_mem {x₁ x₂ z₁ z₂ : List α} {a₁ a₂ : α} (notin_x : a₂ ∉ x₁) (notin_z : a₂ ∉ z₁) : x₁ ++ a₁ :: z₁ = x₂ ++ a₂ :: z₂ ↔ x₁ = x₂ ∧ a₁ = a₂ ∧ z₁ = z₂ := by constructor · simp only [append_eq_append_iff, cons_eq_append_iff, cons_eq_cons] rintro (⟨c, rfl, ⟨rfl, rfl, rfl⟩ \| ⟨d, rfl, rfl⟩⟩ \| ⟨c, rfl, ⟨rfl, rfl, rfl⟩ \| ⟨d, rfl, rfl⟩⟩) <;> simp_all · rintro ⟨rfl, rfl, rfl⟩ rfl section FoldlEqFoldr -- foldl and foldr coincide when f is commutative and associative variable {f : α → α → α} theorem foldl1_eq_foldr1 [hassoc : Std.Associative f] : ∀ a b l, foldl f a (l ++ [b]) = foldr f b (a :: l) \| _, _, nil => rfl \| a, b, c :: l => by simp only [cons_append, foldl_cons, foldr_cons, foldl1_eq_foldr1 _ _ l] rw [hassoc.assoc] theorem foldl_eq_of_comm_of_assoc [hcomm : Std.Commutative f] [hassoc : Std.Associative f] : ∀ a b l, foldl f a (b :: l) = f b (foldl f a l) \| a, b, nil => hcomm.comm a b \| a, b, c :: l => by simp only [foldl_cons] have : RightCommutative f := inferInstance rw [← foldl_eq_of_comm_of_assoc .., this.right_comm, foldl_cons] theorem foldl_eq_foldr [Std.Commutative f] [Std.Associative f] : ∀ a l, foldl f a l = foldr f a l \| _, nil => rfl \| a, b :: l => by simp only [foldr_cons, foldl_eq_of_comm_of_assoc] rw [foldl_eq_foldr a l] end FoldlEqFoldr section FoldlEqFoldlr' variable {f : α → β → α} variable (hf : ∀ a b c, f (f a b) c = f (f a c) b) include hf theorem foldl_eq_of_comm' : ∀ a b l, foldl f a (b :: l) = f (foldl f a l) b \| _, _, [] => rfl \| a, b, c :: l => by rw [foldl, foldl, foldl, ← foldl_eq_of_comm' .., foldl, hf] theorem foldl_eq_foldr' : ∀ a l, foldl f a l = foldr (flip f) a l \| _, [] => rfl \| a, b :: l => by rw [foldl_eq_of_comm' hf, foldr, foldl_eq_foldr' ..]; rfl end FoldlEqFoldlr' section FoldlEqFoldlr' variable {f : α → β → β} theorem foldr_eq_of_comm' (hf : ∀ a b c, f a (f b c) = f b (f a c)) : ∀ a b l, foldr f a (b :: l) = foldr f (f b a) l \| _, _, [] => rfl \| a, b, c :: l => by rw [foldr, foldr, foldr, hf, ← foldr_eq_of_comm' hf ..]; rfl end FoldlEqFoldlr' section variable {op : α → α → α} [ha : Std.Associative op] /-- Notation for `op a b`. -/ local notation a " ⋆ " b => op a b /-- Notation for `foldl op a l`. -/ local notation l " <> " a => foldl op a l theorem foldl_op_eq_op_foldr_assoc : ∀ {l : List α} {a₁ a₂}, ((l <> a₁) ⋆ a₂) = a₁ ⋆ l.foldr (· ⋆ ·) a₂ \| [], _, _ => rfl \| a :: l, a₁, a₂ => by simp only [foldl_cons, foldr_cons, foldl_assoc, ha.assoc]; rw [foldl_op_eq_op_foldr_assoc] variable [hc : Std.Commutative op] theorem foldl_assoc_comm_cons {l : List α} {a₁ a₂} : ((a₁ :: l) <> a₂) = a₁ ⋆ l <> a₂ := by rw [foldl_cons, hc.comm, foldl_assoc] end /-! ### foldlM, foldrM, mapM -/ section FoldlMFoldrM variable {m : Type v → Type w} [Monad m] variable [LawfulMonad m] theorem foldrM_eq_foldr (f : α → β → m β) (b l) : foldrM f b l = foldr (fun a mb => mb >>= f a) (pure b) l := by induction l <;> simp [] theorem foldlM_eq_foldl (f : β → α → m β) (b l) : List.foldlM f b l = foldl (fun mb a => mb >>= fun b => f b a) (pure b) l := by suffices h : ∀ mb : m β, (mb >>= fun b => List.foldlM f b l) = foldl (fun mb a => mb >>= fun b => f b a) mb l by simp [← h (pure b)] induction l with \| nil => intro; simp \| cons _ _ l_ih => intro; simp only [List.foldlM, foldl, ← l_ih, functor_norm] end FoldlMFoldrM /-! ### intersperse -/ @[deprecated (since := "2025-02-07")] alias intersperse_singleton := intersperse_single @[deprecated (since := "2025-02-07")] alias intersperse_cons_cons := intersperse_cons₂ /-! ### map for partial functions -/ @[deprecated "Deprecated without replacement." (since := "2025-02-07")] theorem sizeOf_lt_sizeOf_of_mem [SizeOf α] {x : α} {l : List α} (hx : x ∈ l) : SizeOf.sizeOf x < SizeOf.sizeOf l := by induction l with \| nil => ?_ \| cons h t ih => ?_ <;> cases hx <;> rw [cons.sizeOf_spec] · omega · specialize ih ‹_› omega /-! ### filter -/ theorem length_eq_length_filter_add {l : List (α)} (f : α → Bool) : l.length = (l.filter f).length + (l.filter (! f ·)).length := by simp_rw [← List.countP_eq_length_filter, l.length_eq_countP_add_countP f, Bool.not_eq_true, Bool.decide_eq_false] /-! ### filterMap -/ theorem filterMap_eq_flatMap_toList (f : α → Option β) (l : List α) : l.filterMap f = l.flatMap fun a ↦ (f a).toList := by induction l with \| nil => ?_ \| cons a l ih => ?_ <;> simp [filterMap_cons] rcases f a <;> simp [ih] theorem filterMap_congr {f g : α → Option β} {l : List α} (h : ∀ x ∈ l, f x = g x) : l.filterMap f = l.filterMap g := by induction l <;> simp_all [filterMap_cons] theorem filterMap_eq_map_iff_forall_eq_some {f : α → Option β} {g : α → β} {l : List α} : l.filterMap f = l.map g ↔ ∀ x ∈ l, f x = some (g x) where mp := by induction l with \| nil => simp \| cons a l ih => ?_ rcases ha : f a with - \| b <;> simp [ha, filterMap_cons] · intro h simpa [show (filterMap f l).length = l.length + 1 from by simp[h], Nat.add_one_le_iff] using List.length_filterMap_le f l · rintro rfl h exact ⟨rfl, ih h⟩ mpr h := Eq.trans (filterMap_congr <\| by simpa) (congr_fun filterMap_eq_map _) /-! ### filter -/ section Filter variable {p : α → Bool} theorem filter_singleton {a : α} : [a].filter p = bif p a then [a] else [] := rfl theorem filter_eq_foldr (p : α → Bool) (l : List α) : filter p l = foldr (fun a out => bif p a then a :: out else out) [] l := by induction l <;> simp [, filter]; rfl #adaptation_note /-- nightly-2024-07-27 This has to be temporarily renamed to avoid an unintentional collision. The prime should be removed at nightly-2024-07-27. -/ @[simp] theorem filter_subset' (l : List α) : filter p l ⊆ l := filter_sublist.subset theorem of_mem_filter {a : α} {l} (h : a ∈ filter p l) : p a := (mem_filter.1 h).2 theorem mem_of_mem_filter {a : α} {l} (h : a ∈ filter p l) : a ∈ l := filter_subset' l h theorem mem_filter_of_mem {a : α} {l} (h₁ : a ∈ l) (h₂ : p a) : a ∈ filter p l := mem_filter.2 ⟨h₁, h₂⟩ @[deprecated (since := "2025-02-07")] alias monotone_filter_left := filter_subset variable (p) theorem monotone_filter_right (l : List α) ⦃p q : α → Bool⦄ (h : ∀ a, p a → q a) : l.filter p <+ l.filter q := by induction l with \| nil => rfl \| cons hd tl IH => by_cases hp : p hd · rw [filter_cons_of_pos hp, filter_cons_of_pos (h _ hp)] exact IH.cons_cons hd · rw [filter_cons_of_neg hp] by_cases hq : q hd · rw [filter_cons_of_pos hq] exact sublist_cons_of_sublist hd IH · rw [filter_cons_of_neg hq] exact IH lemma map_filter {f : α → β} (hf : Injective f) (l : List α) [DecidablePred fun b => ∃ a, p a ∧ f a = b] : (l.filter p).map f = (l.map f).filter fun b => ∃ a, p a ∧ f a = b := by simp [comp_def, filter_map, hf.eq_iff] @[deprecated (since := "2025-02-07")] alias map_filter' := map_filter lemma filter_attach' (l : List α) (p : {a // a ∈ l} → Bool) [DecidableEq α] : l.attach.filter p = (l.filter fun x => ∃ h, p ⟨x, h⟩).attach.map (Subtype.map id fun _ => mem_of_mem_filter) := by classical refine map_injective_iff.2 Subtype.coe_injective ?_ simp [comp_def, map_filter _ Subtype.coe_injective] lemma filter_attach (l : List α) (p : α → Bool) : (l.attach.filter fun x => p x : List {x // x ∈ l}) = (l.filter p).attach.map (Subtype.map id fun _ => mem_of_mem_filter) := map_injective_iff.2 Subtype.coe_injective <\| by simp_rw [map_map, comp_def, Subtype.map, id, ← Function.comp_apply (g := Subtype.val), ← filter_map, attach_map_subtype_val] lemma filter_comm (q) (l : List α) : filter p (filter q l) = filter q (filter p l) := by simp [Bool.and_comm] @[simp] theorem filter_true (l : List α) : filter (fun _ => true) l = l := by induction l <;> simp [, filter] @[simp] theorem filter_false (l : List α) : filter (fun _ => false) l = [] := by induction l <;> simp [, filter] end Filter /-! ### eraseP -/ section eraseP variable {p : α → Bool} @[simp] theorem length_eraseP_add_one {l : List α} {a} (al : a ∈ l) (pa : p a) : (l.eraseP p).length + 1 = l.length := by let ⟨_, l₁, l₂, _, _, h₁, h₂⟩ := exists_of_eraseP al pa rw [h₂, h₁, length_append, length_append] rfl end eraseP /-! ### erase -/ section Erase variable [DecidableEq α] @[simp] theorem length_erase_add_one {a : α} {l : List α} (h : a ∈ l) : (l.erase a).length + 1 = l.length := by rw [erase_eq_eraseP, length_eraseP_add_one h (decide_eq_true rfl)] theorem map_erase [DecidableEq β] {f : α → β} (finj : Injective f) {a : α} (l : List α) : map f (l.erase a) = (map f l).erase (f a) := by have this : (a == ·) = (f a == f ·) := by ext b; simp [beq_eq_decide, finj.eq_iff] rw [erase_eq_eraseP, erase_eq_eraseP, eraseP_map, this]; rfl theorem map_foldl_erase [DecidableEq β] {f : α → β} (finj : Injective f) {l₁ l₂ : List α} : map f (foldl List.erase l₁ l₂) = foldl (fun l a => l.erase (f a)) (map f l₁) l₂ := by induction l₂ generalizing l₁ <;> [rfl; simp only [foldl_cons, map_erase finj, ]] theorem erase_getElem [DecidableEq ι] {l : List ι} {i : ℕ} (hi : i < l.length) : Perm (l.erase l[i]) (l.eraseIdx i) := by induction l generalizing i with \| nil => simp \| cons a l IH => cases i with \| zero => simp \| succ i => have hi' : i < l.length := by simpa using hi if ha : a = l[i] then simpa [ha] using .trans (perm_cons_erase (getElem_mem _)) (.cons _ (IH hi')) else simpa [ha] using IH hi' theorem length_eraseIdx_add_one {l : List ι} {i : ℕ} (h : i < l.length) : (l.eraseIdx i).length + 1 = l.length := by rw [length_eraseIdx] split <;> omega end Erase /-! ### diff -/ section Diff variable [DecidableEq α] @[simp] theorem map_diff [DecidableEq β] {f : α → β} (finj : Injective f) {l₁ l₂ : List α} : map f (l₁.diff l₂) = (map f l₁).diff (map f l₂) := by simp only [diff_eq_foldl, foldl_map, map_foldl_erase finj] @[deprecated (since := "2025-04-10")] alias erase_diff_erase_sublist_of_sublist := Sublist.erase_diff_erase_sublist end Diff section Choose variable (p : α → Prop) [DecidablePred p] (l : List α) 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 /-! ### Forall -/ section Forall variable {p q : α → Prop} {l : List α} @[simp] theorem forall_cons (p : α → Prop) (x : α) : ∀ l : List α, Forall p (x :: l) ↔ p x ∧ Forall p l \| [] => (and_iff_left_of_imp fun _ ↦ trivial).symm \| _ :: _ => Iff.rfl @[simp] theorem forall_append {p : α → Prop} : ∀ {xs ys : List α}, Forall p (xs ++ ys) ↔ Forall p xs ∧ Forall p ys \| [] => by simp \| _ :: _ => by simp [forall_append, and_assoc] theorem forall_iff_forall_mem : ∀ {l : List α}, Forall p l ↔ ∀ x ∈ l, p x \| [] => (iff_true_intro <\| forall_mem_nil _).symm \| x :: l => by rw [forall_mem_cons, forall_cons, forall_iff_forall_mem] theorem Forall.imp (h : ∀ x, p x → q x) : ∀ {l : List α}, Forall p l → Forall q l \| [] => id \| x :: l => by simp only [forall_cons, and_imp] rw [← and_imp] exact And.imp (h x) (Forall.imp h) @[simp] theorem forall_map_iff {p : β → Prop} (f : α → β) : Forall p (l.map f) ↔ Forall (p ∘ f) l := by induction l <;> simp [] instance (p : α → Prop) [DecidablePred p] : DecidablePred (Forall p) := fun _ => decidable_of_iff' _ forall_iff_forall_mem end Forall /-! ### Miscellaneous lemmas -/ theorem get_attach (l : List α) (i) : (l.attach.get i).1 = l.get ⟨i, length_attach (l := l) ▸ i.2⟩ := by simp section Disjoint /-- The images of disjoint lists under a partially defined map are disjoint -/ theorem disjoint_pmap {p : α → Prop} {f : ∀ a : α, p a → β} {s t : List α} (hs : ∀ a ∈ s, p a) (ht : ∀ a ∈ t, p a) (hf : ∀ (a a' : α) (ha : p a) (ha' : p a'), f a ha = f a' ha' → a = a') (h : Disjoint s t) : Disjoint (s.pmap f hs) (t.pmap f ht) := by simp only [Disjoint, mem_pmap] rintro b ⟨a, ha, rfl⟩ ⟨a', ha', ha''⟩ apply h ha rwa [hf a a' (hs a ha) (ht a' ha') ha''.symm] /-- The images of disjoint lists under an injective map are disjoint -/ theorem disjoint_map {f : α → β} {s t : List α} (hf : Function.Injective f) (h : Disjoint s t) : Disjoint (s.map f) (t.map f) := by rw [← pmap_eq_map (fun _ _ ↦ trivial), ← pmap_eq_map (fun _ _ ↦ trivial)] exact disjoint_pmap _ _ (fun _ _ _ _ h' ↦ hf h') h alias Disjoint.map := disjoint_map theorem Disjoint.of_map {f : α → β} {s t : List α} (h : Disjoint (s.map f) (t.map f)) : Disjoint s t := fun _a has hat ↦ h (mem_map_of_mem has) (mem_map_of_mem hat) theorem Disjoint.map_iff {f : α → β} {s t : List α} (hf : Function.Injective f) : Disjoint (s.map f) (t.map f) ↔ Disjoint s t := ⟨fun h ↦ h.of_map, fun h ↦ h.map hf⟩ theorem Perm.disjoint_left {l₁ l₂ l : List α} (p : List.Perm l₁ l₂) : Disjoint l₁ l ↔ Disjoint l₂ l := by simp_rw [List.disjoint_left, p.mem_iff] theorem Perm.disjoint_right {l₁ l₂ l : List α} (p : List.Perm l₁ l₂) : Disjoint l l₁ ↔ Disjoint l l₂ := by simp_rw [List.disjoint_right, p.mem_iff] @[simp] theorem disjoint_reverse_left {l₁ l₂ : List α} : Disjoint l₁.reverse l₂ ↔ Disjoint l₁ l₂ := reverse_perm _ \|>.disjoint_left @[simp] theorem disjoint_reverse_right {l₁ l₂ : List α} : Disjoint l₁ l₂.reverse ↔ Disjoint l₁ l₂ := reverse_perm _ \|>.disjoint_right end Disjoint section lookup variable [BEq α] [LawfulBEq α] lemma lookup_graph (f : α → β) {a : α} {as : List α} (h : a ∈ as) : lookup a (as.map fun x => (x, f x)) = some (f a) := by induction as with \| nil => exact (not_mem_nil h).elim \| cons a' as ih => by_cases ha : a = a' · simp [ha, lookup_cons] · simpa [lookup_cons, beq_false_of_ne ha] using ih (List.mem_of_ne_of_mem ha h) end lookup section range' @[simp] lemma range'_0 (a b : ℕ) : range' a b 0 = replicate b a := by induction b with \| zero => simp \| succ b ih => simp [range'_succ, ih, replicate_succ] lemma left_le_of_mem_range' {a b s x : ℕ} (hx : x ∈ List.range' a b s) : a ≤ x := by obtain ⟨i, _, rfl⟩ := List.mem_range'.mp hx exact le_add_right a (s i) end range' end List		Mathlib/Data/List/Basic.lean	2,037	2,038
/- Copyright (c) 2022 Andrew Yang. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Andrew Yang -/ import Mathlib.Topology.Homeomorph.Lemmas import Mathlib.Topology.Sets.Closeds /-! # Noetherian space A Noetherian space is a topological space that satisfies any of the following equivalent conditions: - `WellFounded ((· > ·) : TopologicalSpace.Opens α → TopologicalSpace.Opens α → Prop)` - `WellFounded ((· < ·) : TopologicalSpace.Closeds α → TopologicalSpace.Closeds α → Prop)` - `∀ s : Set α, IsCompact s` - `∀ s : TopologicalSpace.Opens α, IsCompact s` The first is chosen as the definition, and the equivalence is shown in `TopologicalSpace.noetherianSpace_TFAE`. Many examples of noetherian spaces come from algebraic topology. For example, the underlying space of a noetherian scheme (e.g., the spectrum of a noetherian ring) is noetherian. ## Main Results - `TopologicalSpace.NoetherianSpace.set`: Every subspace of a noetherian space is noetherian. - `TopologicalSpace.NoetherianSpace.isCompact`: Every set in a noetherian space is a compact set. - `TopologicalSpace.noetherianSpace_TFAE`: Describes the equivalent definitions of noetherian spaces. - `TopologicalSpace.NoetherianSpace.range`: The image of a noetherian space under a continuous map is noetherian. - `TopologicalSpace.NoetherianSpace.iUnion`: The finite union of noetherian spaces is noetherian. - `TopologicalSpace.NoetherianSpace.discrete`: A noetherian and Hausdorff space is discrete. - `TopologicalSpace.NoetherianSpace.exists_finset_irreducible`: Every closed subset of a noetherian space is a finite union of irreducible closed subsets. - `TopologicalSpace.NoetherianSpace.finite_irreducibleComponents`: The number of irreducible components of a noetherian space is finite. -/ open Topology variable (α β : Type*) [TopologicalSpace α] [TopologicalSpace β] namespace TopologicalSpace /-- Type class for noetherian spaces. It is defined to be spaces whose open sets satisfies ACC. -/ abbrev NoetherianSpace : Prop := WellFoundedGT (Opens α) theorem noetherianSpace_iff_opens : NoetherianSpace α ↔ ∀ s : Opens α, IsCompact (s : Set α) := by rw [NoetherianSpace, CompleteLattice.wellFoundedGT_iff_isSupFiniteCompact, CompleteLattice.isSupFiniteCompact_iff_all_elements_compact] exact forall_congr' Opens.isCompactElement_iff instance (priority := 100) NoetherianSpace.compactSpace [h : NoetherianSpace α] : CompactSpace α := ⟨(noetherianSpace_iff_opens α).mp h ⊤⟩ variable {α β} /-- In a Noetherian space, all sets are compact. -/ protected theorem NoetherianSpace.isCompact [NoetherianSpace α] (s : Set α) : IsCompact s := by refine isCompact_iff_finite_subcover.2 fun U hUo hs => ?_ rcases ((noetherianSpace_iff_opens α).mp ‹_› ⟨⋃ i, U i, isOpen_iUnion hUo⟩).elim_finite_subcover U hUo Set.Subset.rfl with ⟨t, ht⟩ exact ⟨t, hs.trans ht⟩	protected theorem _root_.Topology.IsInducing.noetherianSpace [NoetherianSpace α] {i : β → α} (hi : IsInducing i) : NoetherianSpace β := (noetherianSpace_iff_opens _).2 fun _ => hi.isCompact_iff.2 (NoetherianSpace.isCompact _)	Mathlib/Topology/NoetherianSpace.lean	66	70
/- Copyright (c) 2020 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel, Floris van Doorn -/ import Mathlib.Geometry.Manifold.MFDeriv.Basic /-! ### Relations between vector space derivative and manifold derivative The manifold derivative `mfderiv`, when considered on the model vector space with its trivial manifold structure, coincides with the usual Frechet derivative `fderiv`. In this section, we prove this and related statements. -/ noncomputable section open scoped Manifold variable {𝕜 : Type} [NontriviallyNormedField 𝕜] {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {E' : Type*} [NormedAddCommGroup E'] [NormedSpace 𝕜 E'] {f : E → E'} {s : Set E} {x : E} section MFDerivFDeriv theorem uniqueMDiffWithinAt_iff_uniqueDiffWithinAt : UniqueMDiffWithinAt 𝓘(𝕜, E) s x ↔ UniqueDiffWithinAt 𝕜 s x := by simp only [UniqueMDiffWithinAt, mfld_simps] alias ⟨UniqueMDiffWithinAt.uniqueDiffWithinAt, UniqueDiffWithinAt.uniqueMDiffWithinAt⟩ := uniqueMDiffWithinAt_iff_uniqueDiffWithinAt theorem uniqueMDiffOn_iff_uniqueDiffOn : UniqueMDiffOn 𝓘(𝕜, E) s ↔ UniqueDiffOn 𝕜 s := by simp [UniqueMDiffOn, UniqueDiffOn, uniqueMDiffWithinAt_iff_uniqueDiffWithinAt]	alias ⟨UniqueMDiffOn.uniqueDiffOn, UniqueDiffOn.uniqueMDiffOn⟩ := uniqueMDiffOn_iff_uniqueDiffOn	Mathlib/Geometry/Manifold/MFDeriv/FDeriv.lean	36	37
/- Copyright (c) 2022 Damiano Testa. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Damiano Testa -/ import Mathlib.Algebra.Polynomial.AlgebraMap import Mathlib.Algebra.Polynomial.Reverse import Mathlib.Algebra.Polynomial.Inductions import Mathlib.RingTheory.Localization.Away.Basic /-! # Laurent polynomials We introduce Laurent polynomials over a semiring `R`. Mathematically, they are expressions of the form $$ \sum_{i \in \mathbb{Z}} a_i T ^ i $$ where the sum extends over a finite subset of `ℤ`. Thus, negative exponents are allowed. The coefficients come from the semiring `R` and the variable `T` commutes with everything. Since we are going to convert back and forth between polynomials and Laurent polynomials, we decided to maintain some distinction by using the symbol `T`, rather than `X`, as the variable for Laurent polynomials. ## Notation The symbol `R[T;T⁻¹]` stands for `LaurentPolynomial R`. We also define * `C : R →+* R[T;T⁻¹]` the inclusion of constant polynomials, analogous to the one for `R[X]`; * `T : ℤ → R[T;T⁻¹]` the sequence of powers of the variable `T`. ## Implementation notes We define Laurent polynomials as `AddMonoidAlgebra R ℤ`. Thus, they are essentially `Finsupp`s `ℤ →₀ R`. This choice differs from the current irreducible design of `Polynomial`, that instead shields away the implementation via `Finsupp`s. It is closer to the original definition of polynomials. As a consequence, `LaurentPolynomial` plays well with polynomials, but there is a little roughness in establishing the API, since the `Finsupp` implementation of `R[X]` is well-shielded. Unlike the case of polynomials, I felt that the exponent notation was not too easy to use, as only natural exponents would be allowed. Moreover, in the end, it seems likely that we should aim to perform computations on exponents in `ℤ` anyway and separating this via the symbol `T` seems convenient. I made a heavy use of `simp` lemmas, aiming to bring Laurent polynomials to the form `C a * T n`. Any comments or suggestions for improvements is greatly appreciated! ## Future work Lots is missing! -- (Riccardo) add inclusion into Laurent series. -- A "better" definition of `trunc` would be as an `R`-linear map. This works: -- ``` -- def trunc : R[T;T⁻¹] →[R] R[X] := -- refine (?_ : R[ℕ] →[R] R[X]).comp ?_ -- · exact ⟨(toFinsuppIso R).symm, by simp⟩ -- · refine ⟨fun r ↦ comapDomain _ r -- (Set.injOn_of_injective (fun _ _ ↦ Int.ofNat.inj) _), ?_⟩ -- exact fun r f ↦ comapDomain_smul .. -- ``` -- but it would make sense to bundle the maps better, for a smoother user experience. -- I (DT) did not have the strength to embark on this (possibly short!) journey, after getting to -- this stage of the Laurent process! -- This would likely involve adding a `comapDomain` analogue of -- `AddMonoidAlgebra.mapDomainAlgHom` and an `R`-linear version of -- `Polynomial.toFinsuppIso`. -- Add `degree, intDegree, intTrailingDegree, leadingCoeff, trailingCoeff,...`. -/ open Polynomial Function AddMonoidAlgebra Finsupp noncomputable section variable {R S : Type} /-- The semiring of Laurent polynomials with coefficients in the semiring `R`. We denote it by `R[T;T⁻¹]`. The ring homomorphism `C : R →+ R[T;T⁻¹]` includes `R` as the constant polynomials. -/ abbrev LaurentPolynomial (R : Type) [Semiring R] := AddMonoidAlgebra R ℤ @[nolint docBlame] scoped[LaurentPolynomial] notation:9000 R "[T;T⁻¹]" => LaurentPolynomial R open LaurentPolynomial @[ext] theorem LaurentPolynomial.ext [Semiring R] {p q : R[T;T⁻¹]} (h : ∀ a, p a = q a) : p = q := Finsupp.ext h /-- The ring homomorphism, taking a polynomial with coefficients in `R` to a Laurent polynomial with coefficients in `R`. -/ def Polynomial.toLaurent [Semiring R] : R[X] →+ R[T;T⁻¹] := (mapDomainRingHom R Int.ofNatHom).comp (toFinsuppIso R) /-- This is not a simp lemma, as it is usually preferable to use the lemmas about `C` and `X` instead. -/ theorem Polynomial.toLaurent_apply [Semiring R] (p : R[X]) : toLaurent p = p.toFinsupp.mapDomain (↑) := rfl /-- The `R`-algebra map, taking a polynomial with coefficients in `R` to a Laurent polynomial with coefficients in `R`. -/ def Polynomial.toLaurentAlg [CommSemiring R] : R[X] →ₐ[R] R[T;T⁻¹] := (mapDomainAlgHom R R Int.ofNatHom).comp (toFinsuppIsoAlg R).toAlgHom @[simp] lemma Polynomial.coe_toLaurentAlg [CommSemiring R] : (toLaurentAlg : R[X] → R[T;T⁻¹]) = toLaurent := rfl theorem Polynomial.toLaurentAlg_apply [CommSemiring R] (f : R[X]) : toLaurentAlg f = toLaurent f := rfl namespace LaurentPolynomial section Semiring variable [Semiring R] theorem single_zero_one_eq_one : (Finsupp.single 0 1 : R[T;T⁻¹]) = (1 : R[T;T⁻¹]) := rfl /-! ### The functions `C` and `T`. -/ /-- The ring homomorphism `C`, including `R` into the ring of Laurent polynomials over `R` as the constant Laurent polynomials. -/ def C : R →+* R[T;T⁻¹] := singleZeroRingHom theorem algebraMap_apply {R A : Type} [CommSemiring R] [Semiring A] [Algebra R A] (r : R) : algebraMap R (LaurentPolynomial A) r = C (algebraMap R A r) := rfl /-- When we have `[CommSemiring R]`, the function `C` is the same as `algebraMap R R[T;T⁻¹]`. (But note that `C` is defined when `R` is not necessarily commutative, in which case `algebraMap` is not available.) -/ theorem C_eq_algebraMap {R : Type} [CommSemiring R] (r : R) : C r = algebraMap R R[T;T⁻¹] r := rfl theorem single_eq_C (r : R) : Finsupp.single 0 r = C r := rfl @[simp] lemma C_apply (t : R) (n : ℤ) : C t n = if n = 0 then t else 0 := by rw [← single_eq_C, Finsupp.single_apply]; aesop /-- The function `n ↦ T ^ n`, implemented as a sequence `ℤ → R[T;T⁻¹]`. Using directly `T ^ n` does not work, since we want the exponents to be of Type `ℤ` and there is no `ℤ`-power defined on `R[T;T⁻¹]`. Using that `T` is a unit introduces extra coercions. For these reasons, the definition of `T` is as a sequence. -/ def T (n : ℤ) : R[T;T⁻¹] := Finsupp.single n 1 @[simp] lemma T_apply (m n : ℤ) : (T n : R[T;T⁻¹]) m = if n = m then 1 else 0 := Finsupp.single_apply @[simp] theorem T_zero : (T 0 : R[T;T⁻¹]) = 1 := rfl theorem T_add (m n : ℤ) : (T (m + n) : R[T;T⁻¹]) = T m * T n := by simp [T, single_mul_single] theorem T_sub (m n : ℤ) : (T (m - n) : R[T;T⁻¹]) = T m * T (-n) := by rw [← T_add, sub_eq_add_neg] @[simp] theorem T_pow (m : ℤ) (n : ℕ) : (T m ^ n : R[T;T⁻¹]) = T (n * m) := by rw [T, T, single_pow n, one_pow, nsmul_eq_mul] /-- The `simp` version of `mul_assoc`, in the presence of `T`'s. -/ @[simp] theorem mul_T_assoc (f : R[T;T⁻¹]) (m n : ℤ) : f * T m * T n = f * T (m + n) := by simp [← T_add, mul_assoc] @[simp] theorem single_eq_C_mul_T (r : R) (n : ℤ) : (Finsupp.single n r : R[T;T⁻¹]) = (C r * T n : R[T;T⁻¹]) := by simp [C, T, single_mul_single] -- This lemma locks in the right changes and is what Lean proved directly. -- The actual `simp`-normal form of a Laurent monomial is `C a * T n`, whenever it can be reached. @[simp] theorem _root_.Polynomial.toLaurent_C_mul_T (n : ℕ) (r : R) : (toLaurent (Polynomial.monomial n r) : R[T;T⁻¹]) = C r * T n := show Finsupp.mapDomain (↑) (monomial n r).toFinsupp = (C r * T n : R[T;T⁻¹]) by rw [toFinsupp_monomial, Finsupp.mapDomain_single, single_eq_C_mul_T] @[simp] theorem _root_.Polynomial.toLaurent_C (r : R) : toLaurent (Polynomial.C r) = C r := by convert Polynomial.toLaurent_C_mul_T 0 r simp only [Int.ofNat_zero, T_zero, mul_one] @[simp] theorem _root_.Polynomial.toLaurent_comp_C : toLaurent (R := R) ∘ Polynomial.C = C := funext Polynomial.toLaurent_C @[simp] theorem _root_.Polynomial.toLaurent_X : (toLaurent Polynomial.X : R[T;T⁻¹]) = T 1 := by have : (Polynomial.X : R[X]) = monomial 1 1 := by simp [← C_mul_X_pow_eq_monomial] simp [this, Polynomial.toLaurent_C_mul_T] @[simp] theorem _root_.Polynomial.toLaurent_one : (Polynomial.toLaurent : R[X] → R[T;T⁻¹]) 1 = 1 := map_one Polynomial.toLaurent @[simp] theorem _root_.Polynomial.toLaurent_C_mul_eq (r : R) (f : R[X]) : toLaurent (Polynomial.C r * f) = C r * toLaurent f := by simp only [map_mul, Polynomial.toLaurent_C] @[simp] theorem _root_.Polynomial.toLaurent_X_pow (n : ℕ) : toLaurent (X ^ n : R[X]) = T n := by simp only [map_pow, Polynomial.toLaurent_X, T_pow, mul_one] theorem _root_.Polynomial.toLaurent_C_mul_X_pow (n : ℕ) (r : R) : toLaurent (Polynomial.C r * X ^ n) = C r * T n := by simp only [map_mul, Polynomial.toLaurent_C, Polynomial.toLaurent_X_pow] instance invertibleT (n : ℤ) : Invertible (T n : R[T;T⁻¹]) where invOf := T (-n) invOf_mul_self := by rw [← T_add, neg_add_cancel, T_zero] mul_invOf_self := by rw [← T_add, add_neg_cancel, T_zero] @[simp] theorem invOf_T (n : ℤ) : ⅟ (T n : R[T;T⁻¹]) = T (-n) := rfl theorem isUnit_T (n : ℤ) : IsUnit (T n : R[T;T⁻¹]) := isUnit_of_invertible _ @[elab_as_elim] protected theorem induction_on {M : R[T;T⁻¹] → Prop} (p : R[T;T⁻¹]) (h_C : ∀ a, M (C a)) (h_add : ∀ {p q}, M p → M q → M (p + q)) (h_C_mul_T : ∀ (n : ℕ) (a : R), M (C a * T n) → M (C a * T (n + 1))) (h_C_mul_T_Z : ∀ (n : ℕ) (a : R), M (C a * T (-n)) → M (C a * T (-n - 1))) : M p := by have A : ∀ {n : ℤ} {a : R}, M (C a * T n) := by intro n a refine Int.induction_on n ?_ ?_ ?_ · simpa only [T_zero, mul_one] using h_C a · exact fun m => h_C_mul_T m a · exact fun m => h_C_mul_T_Z m a have B : ∀ s : Finset ℤ, M (s.sum fun n : ℤ => C (p.toFun n) * T n) := by apply Finset.induction · convert h_C 0 simp only [Finset.sum_empty, map_zero] · intro n s ns ih rw [Finset.sum_insert ns] exact h_add A ih convert B p.support ext a simp_rw [← single_eq_C_mul_T] -- Porting note: did not make progress in `simp_rw` rw [Finset.sum_apply'] simp_rw [Finsupp.single_apply, Finset.sum_ite_eq'] split_ifs with h · rfl · exact Finsupp.not_mem_support_iff.mp h /-- To prove something about Laurent polynomials, it suffices to show that * the condition is closed under taking sums, and * it holds for monomials. -/ @[elab_as_elim] protected theorem induction_on' {motive : R[T;T⁻¹] → Prop} (p : R[T;T⁻¹]) (add : ∀ p q, motive p → motive q → motive (p + q)) (C_mul_T : ∀ (n : ℤ) (a : R), motive (C a * T n)) : motive p := by refine p.induction_on (fun a => ?_) (fun {p q} => add p q) ?_ ?_ <;> try exact fun n f _ => C_mul_T _ f convert C_mul_T 0 a exact (mul_one _).symm theorem commute_T (n : ℤ) (f : R[T;T⁻¹]) : Commute (T n) f := f.induction_on' (fun _ _ Tp Tq => Commute.add_right Tp Tq) fun m a => show T n * _ = _ by rw [T, T, ← single_eq_C, single_mul_single, single_mul_single, single_mul_single] simp [add_comm] @[simp] theorem T_mul (n : ℤ) (f : R[T;T⁻¹]) : T n * f = f * T n := (commute_T n f).eq theorem smul_eq_C_mul (r : R) (f : R[T;T⁻¹]) : r • f = C r * f := by induction f using LaurentPolynomial.induction_on' with \| add _ _ hp hq => rw [smul_add, mul_add, hp, hq] \| C_mul_T n s => rw [← mul_assoc, ← smul_mul_assoc, mul_left_inj_of_invertible, ← map_mul, ← single_eq_C, Finsupp.smul_single', single_eq_C] /-- `trunc : R[T;T⁻¹] →+ R[X]` maps a Laurent polynomial `f` to the polynomial whose terms of nonnegative degree coincide with the ones of `f`. The terms of negative degree of `f` "vanish". `trunc` is a left-inverse to `Polynomial.toLaurent`. -/ def trunc : R[T;T⁻¹] →+ R[X] := (toFinsuppIso R).symm.toAddMonoidHom.comp <\| comapDomain.addMonoidHom fun _ _ => Int.ofNat.inj @[simp] theorem trunc_C_mul_T (n : ℤ) (r : R) : trunc (C r * T n) = ite (0 ≤ n) (monomial n.toNat r) 0 := by apply (toFinsuppIso R).injective rw [← single_eq_C_mul_T, trunc, AddMonoidHom.coe_comp, Function.comp_apply] -- Porting note (https://github.com/leanprover-community/mathlib4/issues/11224): was `rw` erw [comapDomain.addMonoidHom_apply Int.ofNat_injective] rw [toFinsuppIso_apply] split_ifs with n0 · rw [toFinsupp_monomial] lift n to ℕ using n0 apply comapDomain_single · rw [toFinsupp_inj] ext a have : n ≠ a := by omega simp only [coeff_ofFinsupp, comapDomain_apply, Int.ofNat_eq_coe, coeff_zero, single_eq_of_ne this] @[simp] theorem leftInverse_trunc_toLaurent : Function.LeftInverse (trunc : R[T;T⁻¹] → R[X]) Polynomial.toLaurent := by refine fun f => f.induction_on' ?_ ?_ · intro f g hf hg simp only [hf, hg, map_add] · intro n r simp only [Polynomial.toLaurent_C_mul_T, trunc_C_mul_T, Int.natCast_nonneg, Int.toNat_natCast, if_true] @[simp] theorem _root_.Polynomial.trunc_toLaurent (f : R[X]) : trunc (toLaurent f) = f := leftInverse_trunc_toLaurent _ theorem _root_.Polynomial.toLaurent_injective : Function.Injective (Polynomial.toLaurent : R[X] → R[T;T⁻¹]) := leftInverse_trunc_toLaurent.injective @[simp] theorem _root_.Polynomial.toLaurent_inj (f g : R[X]) : toLaurent f = toLaurent g ↔ f = g := ⟨fun h => Polynomial.toLaurent_injective h, congr_arg _⟩ theorem _root_.Polynomial.toLaurent_ne_zero {f : R[X]} : toLaurent f ≠ 0 ↔ f ≠ 0 := map_ne_zero_iff _ Polynomial.toLaurent_injective @[simp] theorem _root_.Polynomial.toLaurent_eq_zero {f : R[X]} : toLaurent f = 0 ↔ f = 0 := map_eq_zero_iff _ Polynomial.toLaurent_injective theorem exists_T_pow (f : R[T;T⁻¹]) : ∃ (n : ℕ) (f' : R[X]), toLaurent f' = f * T n := by refine f.induction_on' ?_ fun n a => ?_ <;> clear f · rintro f g ⟨m, fn, hf⟩ ⟨n, gn, hg⟩ refine ⟨m + n, fn * X ^ n + gn * X ^ m, ?_⟩ simp only [hf, hg, add_mul, add_comm (n : ℤ), map_add, map_mul, Polynomial.toLaurent_X_pow, mul_T_assoc, Int.natCast_add] · rcases n with n \| n · exact ⟨0, Polynomial.C a * X ^ n, by simp⟩ · refine ⟨n + 1, Polynomial.C a, ?_⟩ simp only [Int.negSucc_eq, Polynomial.toLaurent_C, Int.natCast_succ, mul_T_assoc, neg_add_cancel, T_zero, mul_one] /-- This is a version of `exists_T_pow` stated as an induction principle. -/ @[elab_as_elim] theorem induction_on_mul_T {Q : R[T;T⁻¹] → Prop} (f : R[T;T⁻¹]) (Qf : ∀ {f : R[X]} {n : ℕ}, Q (toLaurent f * T (-n))) : Q f := by rcases f.exists_T_pow with ⟨n, f', hf⟩ rw [← mul_one f, ← T_zero, ← Nat.cast_zero, ← Nat.sub_self n, Nat.cast_sub rfl.le, T_sub, ← mul_assoc, ← hf] exact Qf /-- Suppose that `Q` is a statement about Laurent polynomials such that * `Q` is true on ordinary polynomials; * `Q (f * T)` implies `Q f`; it follow that `Q` is true on all Laurent polynomials. -/ theorem reduce_to_polynomial_of_mul_T (f : R[T;T⁻¹]) {Q : R[T;T⁻¹] → Prop} (Qf : ∀ f : R[X], Q (toLaurent f)) (QT : ∀ f, Q (f * T 1) → Q f) : Q f := by induction' f using LaurentPolynomial.induction_on_mul_T with f n induction n with \| zero => simpa only [Nat.cast_zero, neg_zero, T_zero, mul_one] using Qf _ \| succ n hn => convert QT _ _; simpa using hn section Support theorem support_C_mul_T (a : R) (n : ℤ) : Finsupp.support (C a * T n) ⊆ {n} := by rw [← single_eq_C_mul_T] exact support_single_subset theorem support_C_mul_T_of_ne_zero {a : R} (a0 : a ≠ 0) (n : ℤ) : Finsupp.support (C a * T n) = {n} := by rw [← single_eq_C_mul_T] exact support_single_ne_zero _ a0 /-- The support of a polynomial `f` is a finset in `ℕ`. The lemma `toLaurent_support f` shows that the support of `f.toLaurent` is the same finset, but viewed in `ℤ` under the natural inclusion `ℕ ↪ ℤ`. -/ theorem toLaurent_support (f : R[X]) : f.toLaurent.support = f.support.map Nat.castEmbedding := by generalize hd : f.support = s revert f refine Finset.induction_on s ?_ ?_ <;> clear s · intro f hf rw [Finset.map_empty, Finsupp.support_eq_empty, toLaurent_eq_zero] exact Polynomial.support_eq_empty.mp hf · intro a s as hf f fs have : (erase a f).toLaurent.support = s.map Nat.castEmbedding := by refine hf (f.erase a) ?_ simp only [fs, Finset.erase_eq_of_not_mem as, Polynomial.support_erase, Finset.erase_insert_eq_erase] rw [← monomial_add_erase f a, Finset.map_insert, ← this, map_add, Polynomial.toLaurent_C_mul_T, support_add_eq, Finset.insert_eq] · congr exact support_C_mul_T_of_ne_zero (Polynomial.mem_support_iff.mp (by simp [fs])) _ · rw [this] exact Disjoint.mono_left (support_C_mul_T _ _) (by simpa) end Support section Degrees /-- The degree of a Laurent polynomial takes values in `WithBot ℤ`. If `f : R[T;T⁻¹]` is a Laurent polynomial, then `f.degree` is the maximum of its support of `f`, or `⊥`, if `f = 0`. -/ def degree (f : R[T;T⁻¹]) : WithBot ℤ := f.support.max @[simp] theorem degree_zero : degree (0 : R[T;T⁻¹]) = ⊥ := rfl @[simp] theorem degree_eq_bot_iff {f : R[T;T⁻¹]} : f.degree = ⊥ ↔ f = 0 := by refine ⟨fun h => ?_, fun h => by rw [h, degree_zero]⟩ ext n simp only [coe_zero, Pi.zero_apply] simp_rw [degree, Finset.max_eq_sup_withBot, Finset.sup_eq_bot_iff, Finsupp.mem_support_iff, Ne, WithBot.coe_ne_bot, imp_false, not_not] at h exact h n section ExactDegrees @[simp] theorem degree_C_mul_T (n : ℤ) (a : R) (a0 : a ≠ 0) : degree (C a * T n) = n := by rw [degree, support_C_mul_T_of_ne_zero a0 n] exact Finset.max_singleton theorem degree_C_mul_T_ite [DecidableEq R] (n : ℤ) (a : R) : degree (C a * T n) = if a = 0 then ⊥ else ↑n := by split_ifs with h <;> simp only [h, map_zero, zero_mul, degree_zero, degree_C_mul_T, Ne, not_false_iff] @[simp] theorem degree_T [Nontrivial R] (n : ℤ) : (T n : R[T;T⁻¹]).degree = n := by rw [← one_mul (T n), ← map_one C] exact degree_C_mul_T n 1 (one_ne_zero : (1 : R) ≠ 0) theorem degree_C {a : R} (a0 : a ≠ 0) : (C a).degree = 0 := by rw [← mul_one (C a), ← T_zero] exact degree_C_mul_T 0 a a0 theorem degree_C_ite [DecidableEq R] (a : R) : (C a).degree = if a = 0 then ⊥ else 0 := by split_ifs with h <;> simp only [h, map_zero, degree_zero, degree_C, Ne, not_false_iff] end ExactDegrees section DegreeBounds theorem degree_C_mul_T_le (n : ℤ) (a : R) : degree (C a * T n) ≤ n := by	by_cases a0 : a = 0 · simp only [a0, map_zero, zero_mul, degree_zero, bot_le] · exact (degree_C_mul_T n a a0).le theorem degree_T_le (n : ℤ) : (T n : R[T;T⁻¹]).degree ≤ n := (le_of_eq (by rw [map_one, one_mul])).trans (degree_C_mul_T_le n (1 : R)) theorem degree_C_le (a : R) : (C a).degree ≤ 0 := (le_of_eq (by rw [T_zero, mul_one])).trans (degree_C_mul_T_le 0 a) end DegreeBounds end Degrees instance : Module R[X] R[T;T⁻¹] := Module.compHom _ Polynomial.toLaurent instance (R : Type*) [Semiring R] : IsScalarTower R[X] R[X] R[T;T⁻¹] where	Mathlib/Algebra/Polynomial/Laurent.lean	461	478
/- Copyright (c) 2019 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mario Carneiro -/ import Mathlib.Algebra.GroupWithZero.Units.Basic import Mathlib.Algebra.Ring.Basic import Mathlib.Algebra.Ring.Int.Defs import Mathlib.Data.Rat.Defs import Mathlib.Algebra.Group.Nat.Defs /-! # The rational numbers are a commutative ring This file contains the commutative ring instance on the rational numbers. See note [foundational algebra order theory]. -/ assert_not_exists OrderedCommMonoid Field PNat Nat.gcd_greatest IsDomain.toCancelMonoidWithZero namespace Rat /-! ### Instances -/ instance commRing : CommRing ℚ where __ := addCommGroup __ := commMonoid zero_mul := Rat.zero_mul mul_zero := Rat.mul_zero left_distrib := Rat.mul_add right_distrib := Rat.add_mul intCast := fun n => n natCast n := Int.cast n natCast_zero := rfl natCast_succ n := by simp only [intCast_eq_divInt, divInt_add_divInt _ _ Int.one_ne_zero Int.one_ne_zero, ← divInt_one_one, Int.natCast_add, Int.natCast_one, mul_one] instance commGroupWithZero : CommGroupWithZero ℚ := { exists_pair_ne := ⟨0, 1, Rat.zero_ne_one⟩ inv_zero := by change Rat.inv 0 = 0 rw [Rat.inv_def] rfl mul_inv_cancel := Rat.mul_inv_cancel mul_zero := mul_zero zero_mul := zero_mul } instance isDomain : IsDomain ℚ := NoZeroDivisors.to_isDomain _ /-- The characteristic of `ℚ` is 0. -/ @[stacks 09FS "Second part."] instance instCharZero : CharZero ℚ where cast_injective a b hab := by simpa using congr_arg num hab /-! ### Extra instances to short-circuit type class resolution These also prevent non-computable instances being used to construct these instances non-computably. -/ instance commSemiring : CommSemiring ℚ := by infer_instance instance semiring : Semiring ℚ := by infer_instance /-! ### Miscellaneous lemmas -/ lemma mkRat_eq_div (n : ℤ) (d : ℕ) : mkRat n d = n / d := by simp only [mkRat_eq_divInt, divInt_eq_div, Int.cast_natCast] lemma divInt_div_divInt_cancel_left {x : ℤ} (hx : x ≠ 0) (n d : ℤ) : n /. x / (d /. x) = n /. d := by rw [div_eq_mul_inv, inv_divInt', divInt_mul_divInt_cancel hx] lemma divInt_div_divInt_cancel_right {x : ℤ} (hx : x ≠ 0) (n d : ℤ) : x /. n / (x /. d) = d /. n := by rw [div_eq_mul_inv, inv_divInt', mul_comm, divInt_mul_divInt_cancel hx] lemma num_div_den (r : ℚ) : (r.num : ℚ) / (r.den : ℚ) = r := by rw [← Int.cast_natCast, ← divInt_eq_div, num_divInt_den] @[simp] lemma divInt_pow (num : ℕ) (den : ℤ) (n : ℕ) : (num /. den) ^ n = num ^ n /. den ^ n := by simp [divInt_eq_div, div_pow, Int.natCast_pow] @[simp] lemma mkRat_pow (num den : ℕ) (n : ℕ) : mkRat num den ^ n = mkRat (num ^ n) (den ^ n) := by rw [mkRat_eq_divInt, mkRat_eq_divInt, divInt_pow, Int.natCast_pow] lemma natCast_eq_divInt (n : ℕ) : ↑n = n /. 1 := by rw [← Int.cast_natCast, intCast_eq_divInt] @[simp] lemma mul_den_eq_num (q : ℚ) : q * q.den = q.num := by suffices (q.num /. ↑q.den) * (↑q.den /. 1) = q.num /. 1 by conv => pattern (occs := 1) q; (rw [← num_divInt_den q]) simp only [intCast_eq_divInt, natCast_eq_divInt, num_divInt_den] at this ⊢; assumption have : (q.den : ℤ) ≠ 0 := mod_cast q.den_ne_zero rw [divInt_mul_divInt _ _ this Int.one_ne_zero, mul_comm (q.den : ℤ) 1, divInt_mul_right this]	@[simp] lemma den_mul_eq_num (q : ℚ) : q.den * q = q.num := by rw [mul_comm, mul_den_eq_num] end Rat	Mathlib/Algebra/Ring/Rat.lean	94	99
/- Copyright (c) 2019 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Patrick Massot, Casper Putz, Anne Baanen -/ import Mathlib.Algebra.Order.Star.Basic import Mathlib.Data.Matrix.RowCol /-! # Dot product of two vectors This file contains some results on the map `dotProduct`, which maps two vectors `v w : n → R` to the sum of the entrywise products `v i * w i`. ## Main results * `dotProduct_stdBasis_one`: the dot product of `v` with the `i`th standard basis vector is `v i` * `dotProduct_eq_zero_iff`: if `v`'s dot product with all `w` is zero, then `v` is zero ## Tags matrix -/ variable {m n p R : Type} section Semiring variable [Semiring R] [Fintype n] theorem dotProduct_eq (v w : n → R) (h : ∀ u, dotProduct v u = dotProduct w u) : v = w := by funext x classical rw [← dotProduct_single_one v x, ← dotProduct_single_one w x, h] @[deprecated (since := "2024-12-12")] protected alias Matrix.dotProduct_eq := dotProduct_eq theorem dotProduct_eq_iff {v w : n → R} : (∀ u, dotProduct v u = dotProduct w u) ↔ v = w := ⟨fun h => dotProduct_eq v w h, fun h _ => h ▸ rfl⟩ @[deprecated (since := "2024-12-12")] protected alias Matrix.dotProduct_eq_iff := dotProduct_eq_iff theorem dotProduct_eq_zero (v : n → R) (h : ∀ w, dotProduct v w = 0) : v = 0 := dotProduct_eq _ _ fun u => (h u).symm ▸ (zero_dotProduct u).symm @[deprecated (since := "2024-12-12")] protected alias Matrix.dotProduct_eq_zero := dotProduct_eq_zero theorem dotProduct_eq_zero_iff {v : n → R} : (∀ w, dotProduct v w = 0) ↔ v = 0 := ⟨fun h => dotProduct_eq_zero v h, fun h w => h.symm ▸ zero_dotProduct w⟩ @[deprecated (since := "2024-12-12")] protected alias Matrix.dotProduct_eq_zero_iff := dotProduct_eq_zero_iff end Semiring section OrderedSemiring variable [Semiring R] [PartialOrder R] [IsOrderedRing R] [Fintype n] lemma dotProduct_nonneg_of_nonneg {v w : n → R} (hv : 0 ≤ v) (hw : 0 ≤ w) : 0 ≤ dotProduct v w := Finset.sum_nonneg (fun i _ => mul_nonneg (hv i) (hw i)) @[deprecated (since := "2024-12-12")] protected alias Matrix.dotProduct_nonneg_of_nonneg := dotProduct_nonneg_of_nonneg lemma dotProduct_le_dotProduct_of_nonneg_right {u v w : n → R} (huv : u ≤ v) (hw : 0 ≤ w) : dotProduct u w ≤ dotProduct v w := Finset.sum_le_sum (fun i _ => mul_le_mul_of_nonneg_right (huv i) (hw i)) @[deprecated (since := "2024-12-12")] protected alias Matrix.dotProduct_le_dotProduct_of_nonneg_right := dotProduct_le_dotProduct_of_nonneg_right lemma dotProduct_le_dotProduct_of_nonneg_left {u v w : n → R} (huv : u ≤ v) (hw : 0 ≤ w) : dotProduct w u ≤ dotProduct w v := Finset.sum_le_sum (fun i _ => mul_le_mul_of_nonneg_left (huv i) (hw i)) @[deprecated (since := "2024-12-12")] protected alias Matrix.dotProduct_le_dotProduct_of_nonneg_left := dotProduct_le_dotProduct_of_nonneg_left end OrderedSemiring section Self variable [Fintype m] [Fintype n] [Fintype p] @[simp] theorem dotProduct_self_eq_zero [Ring R] [LinearOrder R] [IsStrictOrderedRing R] {v : n → R} : dotProduct v v = 0 ↔ v = 0 := (Finset.sum_eq_zero_iff_of_nonneg fun i _ => mul_self_nonneg (v i)).trans <\| by simp [funext_iff] @[deprecated (since := "2024-12-12")] protected alias Matrix.dotProduct_self_eq_zero := dotProduct_self_eq_zero section StarOrderedRing variable [PartialOrder R] [NonUnitalRing R] [StarRing R] [StarOrderedRing R] /-- Note that this applies to `ℂ` via `RCLike.toStarOrderedRing`. -/ @[simp] theorem dotProduct_star_self_nonneg (v : n → R) : 0 ≤ dotProduct (star v) v := Fintype.sum_nonneg fun _ => star_mul_self_nonneg _ @[deprecated (since := "2024-12-12")] protected alias Matrix.dotProduct_star_self_nonneg := dotProduct_star_self_nonneg /-- Note that this applies to `ℂ` via `RCLike.toStarOrderedRing`. -/ @[simp] theorem dotProduct_self_star_nonneg (v : n → R) : 0 ≤ dotProduct v (star v) := Fintype.sum_nonneg fun _ => mul_star_self_nonneg _ @[deprecated (since := "2024-12-12")] protected alias Matrix.dotProduct_self_star_nonneg := dotProduct_self_star_nonneg variable [NoZeroDivisors R] /-- Note that this applies to `ℂ` via `RCLike.toStarOrderedRing`. -/ @[simp] theorem dotProduct_star_self_eq_zero {v : n → R} : dotProduct (star v) v = 0 ↔ v = 0 := (Fintype.sum_eq_zero_iff_of_nonneg fun _ => star_mul_self_nonneg _).trans <\| by simp [funext_iff, mul_eq_zero] @[deprecated (since := "2024-12-12")] protected alias Matrix.dotProduct_star_self_eq_zero := dotProduct_star_self_eq_zero /-- Note that this applies to `ℂ` via `RCLike.toStarOrderedRing`. -/ @[simp] theorem dotProduct_self_star_eq_zero {v : n → R} : dotProduct v (star v) = 0 ↔ v = 0 := (Fintype.sum_eq_zero_iff_of_nonneg fun _ => mul_star_self_nonneg _).trans <\| by simp [funext_iff, mul_eq_zero] @[deprecated (since := "2024-12-12")] protected alias Matrix.dotProduct_self_star_eq_zero := dotProduct_self_star_eq_zero namespace Matrix @[simp] lemma conjTranspose_mul_self_eq_zero {n} {A : Matrix m n R} : Aᴴ A = 0 ↔ A = 0 := ⟨fun h => Matrix.ext fun i j =>	(congr_fun <\| dotProduct_star_self_eq_zero.1 <\| Matrix.ext_iff.2 h j j) i, fun h => h ▸ Matrix.mul_zero _⟩	Mathlib/LinearAlgebra/Matrix/DotProduct.lean	146	148
/- Copyright (c) 2022 Yaël Dillies. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yaël Dillies -/ import Batteries.Tactic.Init import Mathlib.Logic.Function.Defs /-! # Binary map of options This file defines the binary map of `Option`. This is mostly useful to define pointwise operations on intervals. ## Main declarations * `Option.map₂`: Binary map of options. ## Notes This file is very similar to the n-ary section of `Mathlib.Data.Set.Basic`, to `Mathlib.Data.Finset.NAry` and to `Mathlib.Order.Filter.NAry`. Please keep them in sync. We do not define `Option.map₃` as its only purpose so far would be to prove properties of `Option.map₂` and casing already fulfills this task. -/ universe u open Function namespace Option variable {α β γ δ : Type} {f : α → β → γ} {a : Option α} {b : Option β} {c : Option γ} /-- The image of a binary function `f : α → β → γ` as a function `Option α → Option β → Option γ`. Mathematically this should be thought of as the image of the corresponding function `α × β → γ`. -/ def map₂ (f : α → β → γ) (a : Option α) (b : Option β) : Option γ := a.bind fun a => b.map <\| f a /-- `Option.map₂` in terms of monadic operations. Note that this can't be taken as the definition because of the lack of universe polymorphism. -/ theorem map₂_def {α β γ : Type u} (f : α → β → γ) (a : Option α) (b : Option β) : map₂ f a b = f <$> a <> b := by cases a <;> rfl @[simp] theorem map₂_some_some (f : α → β → γ) (a : α) (b : β) : map₂ f (some a) (some b) = f a b := rfl theorem map₂_coe_coe (f : α → β → γ) (a : α) (b : β) : map₂ f a b = f a b := rfl @[simp] theorem map₂_none_left (f : α → β → γ) (b : Option β) : map₂ f none b = none := rfl @[simp] theorem map₂_none_right (f : α → β → γ) (a : Option α) : map₂ f a none = none := by cases a <;> rfl @[simp] theorem map₂_coe_left (f : α → β → γ) (a : α) (b : Option β) : map₂ f a b = b.map fun b => f a b := rfl -- Porting note: This proof was `rfl` in Lean3, but now is not. @[simp] theorem map₂_coe_right (f : α → β → γ) (a : Option α) (b : β) : map₂ f a b = a.map fun a => f a b := by cases a <;> rfl theorem mem_map₂_iff {c : γ} : c ∈ map₂ f a b ↔ ∃ a' b', a' ∈ a ∧ b' ∈ b ∧ f a' b' = c := by simp [map₂, bind_eq_some] /-- `simp`-normal form of `mem_map₂_iff`. -/ @[simp] theorem map₂_eq_some_iff {c : γ} : map₂ f a b = some c ↔ ∃ a' b', a' ∈ a ∧ b' ∈ b ∧ f a' b' = c := by simp [map₂, bind_eq_some] @[simp] theorem map₂_eq_none_iff : map₂ f a b = none ↔ a = none ∨ b = none := by cases a <;> cases b <;> simp theorem map₂_swap (f : α → β → γ) (a : Option α) (b : Option β) : map₂ f a b = map₂ (fun a b => f b a) b a := by cases a <;> cases b <;> rfl theorem map_map₂ (f : α → β → γ) (g : γ → δ) : (map₂ f a b).map g = map₂ (fun a b => g (f a b)) a b := by cases a <;> cases b <;> rfl theorem map₂_map_left (f : γ → β → δ) (g : α → γ) : map₂ f (a.map g) b = map₂ (fun a b => f (g a) b) a b := by cases a <;> rfl theorem map₂_map_right (f : α → γ → δ) (g : β → γ) : map₂ f a (b.map g) = map₂ (fun a b => f a (g b)) a b := by cases b <;> rfl @[simp] theorem map₂_curry (f : α × β → γ) (a : Option α) (b : Option β) : map₂ (curry f) a b = Option.map f (map₂ Prod.mk a b) := (map_map₂ _ _).symm @[simp] theorem map_uncurry (f : α → β → γ) (x : Option (α × β)) : x.map (uncurry f) = map₂ f (x.map Prod.fst) (x.map Prod.snd) := by cases x <;> rfl /-! ### Algebraic replacement rules A collection of lemmas to transfer associativity, commutativity, distributivity, ... of operations to the associativity, commutativity, distributivity, ... of `Option.map₂` of those operations. The proof pattern is `map₂_lemma operation_lemma`. For example, `map₂_comm mul_comm` proves that `map₂ () a b = map₂ () g f` in a `CommSemigroup`. -/ variable {α' β' δ' ε ε' : Type*} theorem map₂_assoc {f : δ → γ → ε} {g : α → β → δ} {f' : α → ε' → ε} {g' : β → γ → ε'} (h_assoc : ∀ a b c, f (g a b) c = f' a (g' b c)) : map₂ f (map₂ g a b) c = map₂ f' a (map₂ g' b c) := by cases a <;> cases b <;> cases c <;> simp [h_assoc] theorem map₂_comm {g : β → α → γ} (h_comm : ∀ a b, f a b = g b a) : map₂ f a b = map₂ g b a := by cases a <;> cases b <;> simp [h_comm] theorem map₂_left_comm {f : α → δ → ε} {g : β → γ → δ} {f' : α → γ → δ'} {g' : β → δ' → ε} (h_left_comm : ∀ a b c, f a (g b c) = g' b (f' a c)) : map₂ f a (map₂ g b c) = map₂ g' b (map₂ f' a c) := by cases a <;> cases b <;> cases c <;> simp [h_left_comm] theorem map₂_right_comm {f : δ → γ → ε} {g : α → β → δ} {f' : α → γ → δ'} {g' : δ' → β → ε} (h_right_comm : ∀ a b c, f (g a b) c = g' (f' a c) b) : map₂ f (map₂ g a b) c = map₂ g' (map₂ f' a c) b := by cases a <;> cases b <;> cases c <;> simp [h_right_comm] theorem map_map₂_distrib {g : γ → δ} {f' : α' → β' → δ} {g₁ : α → α'} {g₂ : β → β'} (h_distrib : ∀ a b, g (f a b) = f' (g₁ a) (g₂ b)) : (map₂ f a b).map g = map₂ f' (a.map g₁) (b.map g₂) := by cases a <;> cases b <;> simp [h_distrib] /-! The following symmetric restatement are needed because unification has a hard time figuring all the functions if you symmetrize on the spot. This is also how the other n-ary APIs do it. -/ /-- Symmetric statement to `Option.map₂_map_left_comm`. -/ theorem map_map₂_distrib_left {g : γ → δ} {f' : α' → β → δ} {g' : α → α'} (h_distrib : ∀ a b, g (f a b) = f' (g' a) b) : (map₂ f a b).map g = map₂ f' (a.map g') b := by cases a <;> cases b <;> simp [h_distrib] /-- Symmetric statement to `Option.map_map₂_right_comm`. -/ theorem map_map₂_distrib_right {g : γ → δ} {f' : α → β' → δ} {g' : β → β'} (h_distrib : ∀ a b, g (f a b) = f' a (g' b)) : (map₂ f a b).map g = map₂ f' a (b.map g') := by cases a <;> cases b <;> simp [h_distrib] /-- Symmetric statement to `Option.map_map₂_distrib_left`. -/ theorem map₂_map_left_comm {f : α' → β → γ} {g : α → α'} {f' : α → β → δ} {g' : δ → γ} (h_left_comm : ∀ a b, f (g a) b = g' (f' a b)) : map₂ f (a.map g) b = (map₂ f' a b).map g' := by cases a <;> cases b <;> simp [h_left_comm] /-- Symmetric statement to `Option.map_map₂_distrib_right`. -/ theorem map_map₂_right_comm {f : α → β' → γ} {g : β → β'} {f' : α → β → δ} {g' : δ → γ} (h_right_comm : ∀ a b, f a (g b) = g' (f' a b)) : map₂ f a (b.map g) = (map₂ f' a b).map g' := by cases a <;> cases b <;> simp [h_right_comm]	theorem map_map₂_antidistrib {g : γ → δ} {f' : β' → α' → δ} {g₁ : β → β'} {g₂ : α → α'} (h_antidistrib : ∀ a b, g (f a b) = f' (g₁ b) (g₂ a)) :	Mathlib/Data/Option/NAry.lean	158	160
/- Copyright (c) 2019 Johannes Hölzl, Zhouhang Zhou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Zhouhang Zhou -/ import Mathlib.Dynamics.Ergodic.MeasurePreserving import Mathlib.MeasureTheory.Function.StronglyMeasurable.AEStronglyMeasurable import Mathlib.MeasureTheory.Integral.Lebesgue.Add import Mathlib.Order.Filter.Germ.Basic import Mathlib.Topology.ContinuousMap.Algebra /-! # Almost everywhere equal functions We build a space of equivalence classes of functions, where two functions are treated as identical if they are almost everywhere equal. We form the set of equivalence classes under the relation of being almost everywhere equal, which is sometimes known as the `L⁰` space. To use this space as a basis for the `L^p` spaces and for the Bochner integral, we consider equivalence classes of strongly measurable functions (or, equivalently, of almost everywhere strongly measurable functions.) See `L1Space.lean` for `L¹` space. ## Notation * `α →ₘ[μ] β` is the type of `L⁰` space, where `α` is a measurable space, `β` is a topological space, and `μ` is a measure on `α`. `f : α →ₘ β` is a "function" in `L⁰`. In comments, `[f]` is also used to denote an `L⁰` function. `ₘ` can be typed as `\_m`. Sometimes it is shown as a box if font is missing. ## Main statements * The linear structure of `L⁰` : Addition and scalar multiplication are defined on `L⁰` in the natural way, i.e., `[f] + [g] := [f + g]`, `c • [f] := [c • f]`. So defined, `α →ₘ β` inherits the linear structure of `β`. For example, if `β` is a module, then `α →ₘ β` is a module over the same ring. See `mk_add_mk`, `neg_mk`, `mk_sub_mk`, `smul_mk`, `add_toFun`, `neg_toFun`, `sub_toFun`, `smul_toFun` * The order structure of `L⁰` : `≤` can be defined in a similar way: `[f] ≤ [g]` if `f a ≤ g a` for almost all `a` in domain. And `α →ₘ β` inherits the preorder and partial order of `β`. TODO: Define `sup` and `inf` on `L⁰` so that it forms a lattice. It seems that `β` must be a linear order, since otherwise `f ⊔ g` may not be a measurable function. ## Implementation notes * `f.toFun` : To find a representative of `f : α →ₘ β`, use the coercion `(f : α → β)`, which is implemented as `f.toFun`. For each operation `op` in `L⁰`, there is a lemma called `coe_fn_op`, characterizing, say, `(f op g : α → β)`. * `ae_eq_fun.mk` : To constructs an `L⁰` function `α →ₘ β` from an almost everywhere strongly measurable function `f : α → β`, use `ae_eq_fun.mk` * `comp` : Use `comp g f` to get `[g ∘ f]` from `g : β → γ` and `[f] : α →ₘ γ` when `g` is continuous. Use `comp_measurable` if `g` is only measurable (this requires the target space to be second countable). * `comp₂` : Use `comp₂ g f₁ f₂` to get `[fun a ↦ g (f₁ a) (f₂ a)]`. For example, `[f + g]` is `comp₂ (+)` ## Tags function space, almost everywhere equal, `L⁰`, ae_eq_fun -/ -- Guard against import creep assert_not_exists InnerProductSpace noncomputable section open Topology Set Filter TopologicalSpace ENNReal EMetric MeasureTheory Function variable {α β γ δ : Type} [MeasurableSpace α] {μ ν : Measure α} namespace MeasureTheory section MeasurableSpace variable [TopologicalSpace β] variable (β) /-- The equivalence relation of being almost everywhere equal for almost everywhere strongly measurable functions. -/ def Measure.aeEqSetoid (μ : Measure α) : Setoid { f : α → β // AEStronglyMeasurable f μ } := ⟨fun f g => (f : α → β) =ᵐ[μ] g, fun {f} => ae_eq_refl f.val, fun {_ _} => ae_eq_symm, fun {_ _ _} => ae_eq_trans⟩ variable (α) /-- The space of equivalence classes of almost everywhere strongly measurable functions, where two strongly measurable functions are equivalent if they agree almost everywhere, i.e., they differ on a set of measure `0`. -/ def AEEqFun (μ : Measure α) : Type _ := Quotient (μ.aeEqSetoid β) variable {α β} @[inherit_doc MeasureTheory.AEEqFun] notation:25 α " →ₘ[" μ "] " β => AEEqFun α β μ end MeasurableSpace variable [TopologicalSpace δ] namespace AEEqFun section variable [TopologicalSpace β] /-- Construct the equivalence class `[f]` of an almost everywhere measurable function `f`, based on the equivalence relation of being almost everywhere equal. -/ def mk {β : Type} [TopologicalSpace β] (f : α → β) (hf : AEStronglyMeasurable f μ) : α →ₘ[μ] β := Quotient.mk'' ⟨f, hf⟩ open scoped Classical in /-- Coercion from a space of equivalence classes of almost everywhere strongly measurable functions to functions. We ensure that if `f` has a constant representative, then we choose that one. -/ @[coe] def cast (f : α →ₘ[μ] β) : α → β := if h : ∃ (b : β), f = mk (const α b) aestronglyMeasurable_const then const α <\| Classical.choose h else AEStronglyMeasurable.mk _ (Quotient.out f : { f : α → β // AEStronglyMeasurable f μ }).2 /-- A measurable representative of an `AEEqFun` [f] -/ instance instCoeFun : CoeFun (α →ₘ[μ] β) fun _ => α → β := ⟨cast⟩ protected theorem stronglyMeasurable (f : α →ₘ[μ] β) : StronglyMeasurable f := by simp only [cast] split_ifs with h · exact stronglyMeasurable_const · apply AEStronglyMeasurable.stronglyMeasurable_mk protected theorem aestronglyMeasurable (f : α →ₘ[μ] β) : AEStronglyMeasurable f μ := f.stronglyMeasurable.aestronglyMeasurable protected theorem measurable [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] (f : α →ₘ[μ] β) : Measurable f := f.stronglyMeasurable.measurable protected theorem aemeasurable [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] (f : α →ₘ[μ] β) : AEMeasurable f μ := f.measurable.aemeasurable @[simp] theorem quot_mk_eq_mk (f : α → β) (hf) : (Quot.mk (@Setoid.r _ <\| μ.aeEqSetoid β) ⟨f, hf⟩ : α →ₘ[μ] β) = mk f hf := rfl @[simp] theorem mk_eq_mk {f g : α → β} {hf hg} : (mk f hf : α →ₘ[μ] β) = mk g hg ↔ f =ᵐ[μ] g := Quotient.eq'' @[simp] theorem mk_coeFn (f : α →ₘ[μ] β) : mk f f.aestronglyMeasurable = f := by conv_lhs => simp only [cast] split_ifs with h · exact Classical.choose_spec h \|>.symm conv_rhs => rw [← Quotient.out_eq' f] rw [← mk, mk_eq_mk] exact (AEStronglyMeasurable.ae_eq_mk _).symm @[ext] theorem ext {f g : α →ₘ[μ] β} (h : f =ᵐ[μ] g) : f = g := by rwa [← f.mk_coeFn, ← g.mk_coeFn, mk_eq_mk] theorem coeFn_mk (f : α → β) (hf) : (mk f hf : α →ₘ[μ] β) =ᵐ[μ] f := by rw [← mk_eq_mk, mk_coeFn] @[elab_as_elim] theorem induction_on (f : α →ₘ[μ] β) {p : (α →ₘ[μ] β) → Prop} (H : ∀ f hf, p (mk f hf)) : p f := Quotient.inductionOn' f <\| Subtype.forall.2 H @[elab_as_elim] theorem induction_on₂ {α' β' : Type} [MeasurableSpace α'] [TopologicalSpace β'] {μ' : Measure α'} (f : α →ₘ[μ] β) (f' : α' →ₘ[μ'] β') {p : (α →ₘ[μ] β) → (α' →ₘ[μ'] β') → Prop} (H : ∀ f hf f' hf', p (mk f hf) (mk f' hf')) : p f f' := induction_on f fun f hf => induction_on f' <\| H f hf @[elab_as_elim] theorem induction_on₃ {α' β' : Type} [MeasurableSpace α'] [TopologicalSpace β'] {μ' : Measure α'} {α'' β'' : Type} [MeasurableSpace α''] [TopologicalSpace β''] {μ'' : Measure α''} (f : α →ₘ[μ] β) (f' : α' →ₘ[μ'] β') (f'' : α'' →ₘ[μ''] β'') {p : (α →ₘ[μ] β) → (α' →ₘ[μ'] β') → (α'' →ₘ[μ''] β'') → Prop} (H : ∀ f hf f' hf' f'' hf'', p (mk f hf) (mk f' hf') (mk f'' hf'')) : p f f' f'' := induction_on f fun f hf => induction_on₂ f' f'' <\| H f hf end /-! ### Composition of an a.e. equal function with a (quasi) measure preserving function -/ section compQuasiMeasurePreserving variable [TopologicalSpace γ] [MeasurableSpace β] {ν : MeasureTheory.Measure β} {f : α → β} open MeasureTheory.Measure (QuasiMeasurePreserving) /-- Composition of an almost everywhere equal function and a quasi measure preserving function. See also `AEEqFun.compMeasurePreserving`. -/ def compQuasiMeasurePreserving (g : β →ₘ[ν] γ) (f : α → β) (hf : QuasiMeasurePreserving f μ ν) : α →ₘ[μ] γ := Quotient.liftOn' g (fun g ↦ mk (g ∘ f) <\| g.2.comp_quasiMeasurePreserving hf) fun _ _ h ↦ mk_eq_mk.2 <\| h.comp_tendsto hf.tendsto_ae @[simp] theorem compQuasiMeasurePreserving_mk {g : β → γ} (hg : AEStronglyMeasurable g ν) (hf : QuasiMeasurePreserving f μ ν) : (mk g hg).compQuasiMeasurePreserving f hf = mk (g ∘ f) (hg.comp_quasiMeasurePreserving hf) := rfl theorem compQuasiMeasurePreserving_eq_mk (g : β →ₘ[ν] γ) (hf : QuasiMeasurePreserving f μ ν) : g.compQuasiMeasurePreserving f hf = mk (g ∘ f) (g.aestronglyMeasurable.comp_quasiMeasurePreserving hf) := by rw [← compQuasiMeasurePreserving_mk g.aestronglyMeasurable hf, mk_coeFn] theorem coeFn_compQuasiMeasurePreserving (g : β →ₘ[ν] γ) (hf : QuasiMeasurePreserving f μ ν) : g.compQuasiMeasurePreserving f hf =ᵐ[μ] g ∘ f := by rw [compQuasiMeasurePreserving_eq_mk] apply coeFn_mk end compQuasiMeasurePreserving section compMeasurePreserving variable [TopologicalSpace γ] [MeasurableSpace β] {ν : MeasureTheory.Measure β} {f : α → β} {g : β → γ} /-- Composition of an almost everywhere equal function and a quasi measure preserving function. This is an important special case of `AEEqFun.compQuasiMeasurePreserving`. We use a separate definition so that lemmas that need `f` to be measure preserving can be `@[simp]` lemmas. -/ def compMeasurePreserving (g : β →ₘ[ν] γ) (f : α → β) (hf : MeasurePreserving f μ ν) : α →ₘ[μ] γ := g.compQuasiMeasurePreserving f hf.quasiMeasurePreserving @[simp] theorem compMeasurePreserving_mk (hg : AEStronglyMeasurable g ν) (hf : MeasurePreserving f μ ν) : (mk g hg).compMeasurePreserving f hf = mk (g ∘ f) (hg.comp_quasiMeasurePreserving hf.quasiMeasurePreserving) := rfl theorem compMeasurePreserving_eq_mk (g : β →ₘ[ν] γ) (hf : MeasurePreserving f μ ν) : g.compMeasurePreserving f hf = mk (g ∘ f) (g.aestronglyMeasurable.comp_quasiMeasurePreserving hf.quasiMeasurePreserving) := g.compQuasiMeasurePreserving_eq_mk _ theorem coeFn_compMeasurePreserving (g : β →ₘ[ν] γ) (hf : MeasurePreserving f μ ν) : g.compMeasurePreserving f hf =ᵐ[μ] g ∘ f := g.coeFn_compQuasiMeasurePreserving _ end compMeasurePreserving variable [TopologicalSpace β] [TopologicalSpace γ] /-- Given a continuous function `g : β → γ`, and an almost everywhere equal function `[f] : α →ₘ β`, return the equivalence class of `g ∘ f`, i.e., the almost everywhere equal function `[g ∘ f] : α →ₘ γ`. -/ def comp (g : β → γ) (hg : Continuous g) (f : α →ₘ[μ] β) : α →ₘ[μ] γ := Quotient.liftOn' f (fun f => mk (g ∘ (f : α → β)) (hg.comp_aestronglyMeasurable f.2)) fun _ _ H => mk_eq_mk.2 <\| H.fun_comp g @[simp] theorem comp_mk (g : β → γ) (hg : Continuous g) (f : α → β) (hf) : comp g hg (mk f hf : α →ₘ[μ] β) = mk (g ∘ f) (hg.comp_aestronglyMeasurable hf) := rfl theorem comp_eq_mk (g : β → γ) (hg : Continuous g) (f : α →ₘ[μ] β) : comp g hg f = mk (g ∘ f) (hg.comp_aestronglyMeasurable f.aestronglyMeasurable) := by rw [← comp_mk g hg f f.aestronglyMeasurable, mk_coeFn] theorem coeFn_comp (g : β → γ) (hg : Continuous g) (f : α →ₘ[μ] β) : comp g hg f =ᵐ[μ] g ∘ f := by rw [comp_eq_mk] apply coeFn_mk theorem comp_compQuasiMeasurePreserving {β : Type} [MeasurableSpace β] {ν} (g : γ → δ) (hg : Continuous g) (f : β →ₘ[ν] γ) {φ : α → β} (hφ : Measure.QuasiMeasurePreserving φ μ ν) : (comp g hg f).compQuasiMeasurePreserving φ hφ = comp g hg (f.compQuasiMeasurePreserving φ hφ) := by rcases f; rfl section CompMeasurable variable [MeasurableSpace β] [PseudoMetrizableSpace β] [BorelSpace β] [MeasurableSpace γ] [PseudoMetrizableSpace γ] [OpensMeasurableSpace γ] [SecondCountableTopology γ] /-- Given a measurable function `g : β → γ`, and an almost everywhere equal function `[f] : α →ₘ β`, return the equivalence class of `g ∘ f`, i.e., the almost everywhere equal function `[g ∘ f] : α →ₘ γ`. This requires that `γ` has a second countable topology. -/ def compMeasurable (g : β → γ) (hg : Measurable g) (f : α →ₘ[μ] β) : α →ₘ[μ] γ := Quotient.liftOn' f (fun f' => mk (g ∘ (f' : α → β)) (hg.comp_aemeasurable f'.2.aemeasurable).aestronglyMeasurable) fun _ _ H => mk_eq_mk.2 <\| H.fun_comp g @[simp] theorem compMeasurable_mk (g : β → γ) (hg : Measurable g) (f : α → β) (hf : AEStronglyMeasurable f μ) : compMeasurable g hg (mk f hf : α →ₘ[μ] β) = mk (g ∘ f) (hg.comp_aemeasurable hf.aemeasurable).aestronglyMeasurable := rfl theorem compMeasurable_eq_mk (g : β → γ) (hg : Measurable g) (f : α →ₘ[μ] β) : compMeasurable g hg f = mk (g ∘ f) (hg.comp_aemeasurable f.aemeasurable).aestronglyMeasurable := by rw [← compMeasurable_mk g hg f f.aestronglyMeasurable, mk_coeFn] theorem coeFn_compMeasurable (g : β → γ) (hg : Measurable g) (f : α →ₘ[μ] β) : compMeasurable g hg f =ᵐ[μ] g ∘ f := by rw [compMeasurable_eq_mk] apply coeFn_mk end CompMeasurable /-- The class of `x ↦ (f x, g x)`. -/ def pair (f : α →ₘ[μ] β) (g : α →ₘ[μ] γ) : α →ₘ[μ] β × γ := Quotient.liftOn₂' f g (fun f g => mk (fun x => (f.1 x, g.1 x)) (f.2.prodMk g.2)) fun _f _g _f' _g' Hf Hg => mk_eq_mk.2 <\| Hf.prodMk Hg @[simp] theorem pair_mk_mk (f : α → β) (hf) (g : α → γ) (hg) : (mk f hf : α →ₘ[μ] β).pair (mk g hg) = mk (fun x => (f x, g x)) (hf.prodMk hg) := rfl theorem pair_eq_mk (f : α →ₘ[μ] β) (g : α →ₘ[μ] γ) : f.pair g = mk (fun x => (f x, g x)) (f.aestronglyMeasurable.prodMk g.aestronglyMeasurable) := by simp only [← pair_mk_mk, mk_coeFn, f.aestronglyMeasurable, g.aestronglyMeasurable] theorem coeFn_pair (f : α →ₘ[μ] β) (g : α →ₘ[μ] γ) : f.pair g =ᵐ[μ] fun x => (f x, g x) := by rw [pair_eq_mk] apply coeFn_mk /-- Given a continuous function `g : β → γ → δ`, and almost everywhere equal functions `[f₁] : α →ₘ β` and `[f₂] : α →ₘ γ`, return the equivalence class of the function `fun a => g (f₁ a) (f₂ a)`, i.e., the almost everywhere equal function `[fun a => g (f₁ a) (f₂ a)] : α →ₘ γ` -/ def comp₂ (g : β → γ → δ) (hg : Continuous (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : α →ₘ[μ] δ := comp _ hg (f₁.pair f₂) @[simp] theorem comp₂_mk_mk (g : β → γ → δ) (hg : Continuous (uncurry g)) (f₁ : α → β) (f₂ : α → γ) (hf₁ hf₂) : comp₂ g hg (mk f₁ hf₁ : α →ₘ[μ] β) (mk f₂ hf₂) = mk (fun a => g (f₁ a) (f₂ a)) (hg.comp_aestronglyMeasurable (hf₁.prodMk hf₂)) := rfl theorem comp₂_eq_pair (g : β → γ → δ) (hg : Continuous (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : comp₂ g hg f₁ f₂ = comp _ hg (f₁.pair f₂) := rfl theorem comp₂_eq_mk (g : β → γ → δ) (hg : Continuous (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : comp₂ g hg f₁ f₂ = mk (fun a => g (f₁ a) (f₂ a)) (hg.comp_aestronglyMeasurable (f₁.aestronglyMeasurable.prodMk f₂.aestronglyMeasurable)) := by rw [comp₂_eq_pair, pair_eq_mk, comp_mk]; rfl theorem coeFn_comp₂ (g : β → γ → δ) (hg : Continuous (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : comp₂ g hg f₁ f₂ =ᵐ[μ] fun a => g (f₁ a) (f₂ a) := by rw [comp₂_eq_mk] apply coeFn_mk section variable [MeasurableSpace β] [PseudoMetrizableSpace β] [BorelSpace β] [MeasurableSpace γ] [PseudoMetrizableSpace γ] [BorelSpace γ] [SecondCountableTopologyEither β γ] [MeasurableSpace δ] [PseudoMetrizableSpace δ] [OpensMeasurableSpace δ] [SecondCountableTopology δ] /-- Given a measurable function `g : β → γ → δ`, and almost everywhere equal functions `[f₁] : α →ₘ β` and `[f₂] : α →ₘ γ`, return the equivalence class of the function `fun a => g (f₁ a) (f₂ a)`, i.e., the almost everywhere equal function `[fun a => g (f₁ a) (f₂ a)] : α →ₘ γ`. This requires `δ` to have second-countable topology. -/ def comp₂Measurable (g : β → γ → δ) (hg : Measurable (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : α →ₘ[μ] δ := compMeasurable _ hg (f₁.pair f₂) @[simp] theorem comp₂Measurable_mk_mk (g : β → γ → δ) (hg : Measurable (uncurry g)) (f₁ : α → β) (f₂ : α → γ) (hf₁ hf₂) : comp₂Measurable g hg (mk f₁ hf₁ : α →ₘ[μ] β) (mk f₂ hf₂) = mk (fun a => g (f₁ a) (f₂ a)) (hg.comp_aemeasurable (hf₁.aemeasurable.prodMk hf₂.aemeasurable)).aestronglyMeasurable := rfl theorem comp₂Measurable_eq_pair (g : β → γ → δ) (hg : Measurable (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : comp₂Measurable g hg f₁ f₂ = compMeasurable _ hg (f₁.pair f₂) := rfl theorem comp₂Measurable_eq_mk (g : β → γ → δ) (hg : Measurable (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : comp₂Measurable g hg f₁ f₂ = mk (fun a => g (f₁ a) (f₂ a)) (hg.comp_aemeasurable (f₁.aemeasurable.prodMk f₂.aemeasurable)).aestronglyMeasurable := by rw [comp₂Measurable_eq_pair, pair_eq_mk, compMeasurable_mk]; rfl theorem coeFn_comp₂Measurable (g : β → γ → δ) (hg : Measurable (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : comp₂Measurable g hg f₁ f₂ =ᵐ[μ] fun a => g (f₁ a) (f₂ a) := by rw [comp₂Measurable_eq_mk] apply coeFn_mk end /-- Interpret `f : α →ₘ[μ] β` as a germ at `ae μ` forgetting that `f` is almost everywhere strongly measurable. -/ def toGerm (f : α →ₘ[μ] β) : Germ (ae μ) β := Quotient.liftOn' f (fun f => ((f : α → β) : Germ (ae μ) β)) fun _ _ H => Germ.coe_eq.2 H @[simp] theorem mk_toGerm (f : α → β) (hf) : (mk f hf : α →ₘ[μ] β).toGerm = f := rfl theorem toGerm_eq (f : α →ₘ[μ] β) : f.toGerm = (f : α → β) := by rw [← mk_toGerm, mk_coeFn] theorem toGerm_injective : Injective (toGerm : (α →ₘ[μ] β) → Germ (ae μ) β) := fun f g H => ext <\| Germ.coe_eq.1 <\| by rwa [← toGerm_eq, ← toGerm_eq] @[simp] theorem compQuasiMeasurePreserving_toGerm {β : Type} [MeasurableSpace β] {f : α → β} {ν} (g : β →ₘ[ν] γ) (hf : Measure.QuasiMeasurePreserving f μ ν) : (g.compQuasiMeasurePreserving f hf).toGerm = g.toGerm.compTendsto f hf.tendsto_ae := by rcases g; rfl @[simp] theorem compMeasurePreserving_toGerm {β : Type} [MeasurableSpace β] {f : α → β} {ν} (g : β →ₘ[ν] γ) (hf : MeasurePreserving f μ ν) : (g.compMeasurePreserving f hf).toGerm = g.toGerm.compTendsto f hf.quasiMeasurePreserving.tendsto_ae := compQuasiMeasurePreserving_toGerm _ _ theorem comp_toGerm (g : β → γ) (hg : Continuous g) (f : α →ₘ[μ] β) : (comp g hg f).toGerm = f.toGerm.map g := induction_on f fun f _ => by simp theorem compMeasurable_toGerm [MeasurableSpace β] [BorelSpace β] [PseudoMetrizableSpace β] [PseudoMetrizableSpace γ] [SecondCountableTopology γ] [MeasurableSpace γ] [OpensMeasurableSpace γ] (g : β → γ) (hg : Measurable g) (f : α →ₘ[μ] β) : (compMeasurable g hg f).toGerm = f.toGerm.map g := induction_on f fun f _ => by simp theorem comp₂_toGerm (g : β → γ → δ) (hg : Continuous (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : (comp₂ g hg f₁ f₂).toGerm = f₁.toGerm.map₂ g f₂.toGerm := induction_on₂ f₁ f₂ fun f₁ _ f₂ _ => by simp theorem comp₂Measurable_toGerm [PseudoMetrizableSpace β] [MeasurableSpace β] [BorelSpace β] [PseudoMetrizableSpace γ] [SecondCountableTopologyEither β γ] [MeasurableSpace γ] [BorelSpace γ] [PseudoMetrizableSpace δ] [SecondCountableTopology δ] [MeasurableSpace δ] [OpensMeasurableSpace δ] (g : β → γ → δ) (hg : Measurable (uncurry g)) (f₁ : α →ₘ[μ] β) (f₂ : α →ₘ[μ] γ) : (comp₂Measurable g hg f₁ f₂).toGerm = f₁.toGerm.map₂ g f₂.toGerm := induction_on₂ f₁ f₂ fun f₁ _ f₂ _ => by simp /-- Given a predicate `p` and an equivalence class `[f]`, return true if `p` holds of `f a` for almost all `a` -/ def LiftPred (p : β → Prop) (f : α →ₘ[μ] β) : Prop := f.toGerm.LiftPred p /-- Given a relation `r` and equivalence class `[f]` and `[g]`, return true if `r` holds of `(f a, g a)` for almost all `a` -/ def LiftRel (r : β → γ → Prop) (f : α →ₘ[μ] β) (g : α →ₘ[μ] γ) : Prop := f.toGerm.LiftRel r g.toGerm theorem liftRel_mk_mk {r : β → γ → Prop} {f : α → β} {g : α → γ} {hf hg} : LiftRel r (mk f hf : α →ₘ[μ] β) (mk g hg) ↔ ∀ᵐ a ∂μ, r (f a) (g a) := Iff.rfl theorem liftRel_iff_coeFn {r : β → γ → Prop} {f : α →ₘ[μ] β} {g : α →ₘ[μ] γ} : LiftRel r f g ↔ ∀ᵐ a ∂μ, r (f a) (g a) := by rw [← liftRel_mk_mk, mk_coeFn, mk_coeFn] section Order instance instPreorder [Preorder β] : Preorder (α →ₘ[μ] β) := Preorder.lift toGerm @[simp] theorem mk_le_mk [Preorder β] {f g : α → β} (hf hg) : (mk f hf : α →ₘ[μ] β) ≤ mk g hg ↔ f ≤ᵐ[μ] g := Iff.rfl @[simp, norm_cast] theorem coeFn_le [Preorder β] {f g : α →ₘ[μ] β} : (f : α → β) ≤ᵐ[μ] g ↔ f ≤ g := liftRel_iff_coeFn.symm instance instPartialOrder [PartialOrder β] : PartialOrder (α →ₘ[μ] β) := PartialOrder.lift toGerm toGerm_injective section Lattice section Sup variable [SemilatticeSup β] [ContinuousSup β] instance instSup : Max (α →ₘ[μ] β) where max f g := AEEqFun.comp₂ (· ⊔ ·) continuous_sup f g theorem coeFn_sup (f g : α →ₘ[μ] β) : ⇑(f ⊔ g) =ᵐ[μ] fun x => f x ⊔ g x := coeFn_comp₂ _ _ _ _ protected theorem le_sup_left (f g : α →ₘ[μ] β) : f ≤ f ⊔ g := by rw [← coeFn_le] filter_upwards [coeFn_sup f g] with _ ha rw [ha] exact le_sup_left protected theorem le_sup_right (f g : α →ₘ[μ] β) : g ≤ f ⊔ g := by rw [← coeFn_le] filter_upwards [coeFn_sup f g] with _ ha rw [ha] exact le_sup_right protected theorem sup_le (f g f' : α →ₘ[μ] β) (hf : f ≤ f') (hg : g ≤ f') : f ⊔ g ≤ f' := by rw [← coeFn_le] at hf hg ⊢ filter_upwards [hf, hg, coeFn_sup f g] with _ haf hag ha_sup rw [ha_sup] exact sup_le haf hag end Sup section Inf variable [SemilatticeInf β] [ContinuousInf β] instance instInf : Min (α →ₘ[μ] β) where min f g := AEEqFun.comp₂ (· ⊓ ·) continuous_inf f g theorem coeFn_inf (f g : α →ₘ[μ] β) : ⇑(f ⊓ g) =ᵐ[μ] fun x => f x ⊓ g x := coeFn_comp₂ _ _ _ _ protected theorem inf_le_left (f g : α →ₘ[μ] β) : f ⊓ g ≤ f := by rw [← coeFn_le] filter_upwards [coeFn_inf f g] with _ ha rw [ha] exact inf_le_left protected theorem inf_le_right (f g : α →ₘ[μ] β) : f ⊓ g ≤ g := by rw [← coeFn_le] filter_upwards [coeFn_inf f g] with _ ha rw [ha] exact inf_le_right protected theorem le_inf (f' f g : α →ₘ[μ] β) (hf : f' ≤ f) (hg : f' ≤ g) : f' ≤ f ⊓ g := by rw [← coeFn_le] at hf hg ⊢ filter_upwards [hf, hg, coeFn_inf f g] with _ haf hag ha_inf rw [ha_inf] exact le_inf haf hag end Inf instance instLattice [Lattice β] [TopologicalLattice β] : Lattice (α →ₘ[μ] β) := { AEEqFun.instPartialOrder with sup := max le_sup_left := AEEqFun.le_sup_left le_sup_right := AEEqFun.le_sup_right sup_le := AEEqFun.sup_le inf := min inf_le_left := AEEqFun.inf_le_left inf_le_right := AEEqFun.inf_le_right le_inf := AEEqFun.le_inf } end Lattice end Order variable (α) /-- The equivalence class of a constant function: `[fun _ : α => b]`, based on the equivalence relation of being almost everywhere equal -/ def const (b : β) : α →ₘ[μ] β := mk (fun _ : α ↦ b) aestronglyMeasurable_const theorem coeFn_const (b : β) : (const α b : α →ₘ[μ] β) =ᵐ[μ] Function.const α b := coeFn_mk _ _ /-- If the measure is nonzero, we can strengthen `coeFn_const` to get an equality. -/ @[simp] theorem coeFn_const_eq [NeZero μ] (b : β) (x : α) : (const α b : α →ₘ[μ] β) x = b := by simp only [cast] split_ifs with h; swap; · exact h.elim ⟨b, rfl⟩ have := Classical.choose_spec h set b' := Classical.choose h simp_rw [const, mk_eq_mk, EventuallyEq, ← const_def, eventually_const] at this rw [Function.const, this] variable {α} instance instInhabited [Inhabited β] : Inhabited (α →ₘ[μ] β) := ⟨const α default⟩ @[to_additive] instance instOne [One β] : One (α →ₘ[μ] β) := ⟨const α 1⟩ @[to_additive] theorem one_def [One β] : (1 : α →ₘ[μ] β) = mk (fun _ : α => 1) aestronglyMeasurable_const := rfl @[to_additive] theorem coeFn_one [One β] : ⇑(1 : α →ₘ[μ] β) =ᵐ[μ] 1 := coeFn_const .. @[to_additive (attr := simp)] theorem coeFn_one_eq [NeZero μ] [One β] {x : α} : (1 : α →ₘ[μ] β) x = 1 := coeFn_const_eq .. @[to_additive (attr := simp)] theorem one_toGerm [One β] : (1 : α →ₘ[μ] β).toGerm = 1 := rfl -- Note we set up the scalar actions before the `Monoid` structures in case we want to -- try to override the `nsmul` or `zsmul` fields in future. section SMul variable {𝕜 𝕜' : Type} variable [SMul 𝕜 γ] [ContinuousConstSMul 𝕜 γ] variable [SMul 𝕜' γ] [ContinuousConstSMul 𝕜' γ] instance instSMul : SMul 𝕜 (α →ₘ[μ] γ) := ⟨fun c f => comp (c • ·) (continuous_id.const_smul c) f⟩ @[simp] theorem smul_mk (c : 𝕜) (f : α → γ) (hf : AEStronglyMeasurable f μ) : c • (mk f hf : α →ₘ[μ] γ) = mk (c • f) (hf.const_smul _) := rfl theorem coeFn_smul (c : 𝕜) (f : α →ₘ[μ] γ) : ⇑(c • f) =ᵐ[μ] c • ⇑f := coeFn_comp _ _ _ theorem smul_toGerm (c : 𝕜) (f : α →ₘ[μ] γ) : (c • f).toGerm = c • f.toGerm := comp_toGerm _ _ _ instance instSMulCommClass [SMulCommClass 𝕜 𝕜' γ] : SMulCommClass 𝕜 𝕜' (α →ₘ[μ] γ) := ⟨fun a b f => induction_on f fun f hf => by simp_rw [smul_mk, smul_comm]⟩ instance instIsScalarTower [SMul 𝕜 𝕜'] [IsScalarTower 𝕜 𝕜' γ] : IsScalarTower 𝕜 𝕜' (α →ₘ[μ] γ) := ⟨fun a b f => induction_on f fun f hf => by simp_rw [smul_mk, smul_assoc]⟩ instance instIsCentralScalar [SMul 𝕜ᵐᵒᵖ γ] [IsCentralScalar 𝕜 γ] : IsCentralScalar 𝕜 (α →ₘ[μ] γ) := ⟨fun a f => induction_on f fun f hf => by simp_rw [smul_mk, op_smul_eq_smul]⟩ end SMul section Mul variable [Mul γ] [ContinuousMul γ] @[to_additive] instance instMul : Mul (α →ₘ[μ] γ) := ⟨comp₂ (· ·) continuous_mul⟩ @[to_additive (attr := simp)] theorem mk_mul_mk (f g : α → γ) (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) : (mk f hf : α →ₘ[μ] γ) * mk g hg = mk (f * g) (hf.mul hg) := rfl @[to_additive] theorem coeFn_mul (f g : α →ₘ[μ] γ) : ⇑(f * g) =ᵐ[μ] f * g := coeFn_comp₂ _ _ _ _ @[to_additive (attr := simp)] theorem mul_toGerm (f g : α →ₘ[μ] γ) : (f * g).toGerm = f.toGerm * g.toGerm := comp₂_toGerm _ _ _ _ end Mul instance instAddMonoid [AddMonoid γ] [ContinuousAdd γ] : AddMonoid (α →ₘ[μ] γ) := toGerm_injective.addMonoid toGerm zero_toGerm add_toGerm fun _ _ => smul_toGerm _ _ instance instAddCommMonoid [AddCommMonoid γ] [ContinuousAdd γ] : AddCommMonoid (α →ₘ[μ] γ) := toGerm_injective.addCommMonoid toGerm zero_toGerm add_toGerm fun _ _ => smul_toGerm _ _ section Monoid variable [Monoid γ] [ContinuousMul γ] instance instPowNat : Pow (α →ₘ[μ] γ) ℕ := ⟨fun f n => comp _ (continuous_pow n) f⟩ @[simp] theorem mk_pow (f : α → γ) (hf) (n : ℕ) : (mk f hf : α →ₘ[μ] γ) ^ n = mk (f ^ n) ((_root_.continuous_pow n).comp_aestronglyMeasurable hf) := rfl theorem coeFn_pow (f : α →ₘ[μ] γ) (n : ℕ) : ⇑(f ^ n) =ᵐ[μ] (⇑f) ^ n := coeFn_comp _ _ _ @[simp] theorem pow_toGerm (f : α →ₘ[μ] γ) (n : ℕ) : (f ^ n).toGerm = f.toGerm ^ n := comp_toGerm _ _ _ @[to_additive existing] instance instMonoid : Monoid (α →ₘ[μ] γ) := toGerm_injective.monoid toGerm one_toGerm mul_toGerm pow_toGerm /-- `AEEqFun.toGerm` as a `MonoidHom`. -/ @[to_additive (attr := simps) "`AEEqFun.toGerm` as an `AddMonoidHom`."] def toGermMonoidHom : (α →ₘ[μ] γ) →* (ae μ).Germ γ where toFun := toGerm map_one' := one_toGerm map_mul' := mul_toGerm end Monoid @[to_additive existing] instance instCommMonoid [CommMonoid γ] [ContinuousMul γ] : CommMonoid (α →ₘ[μ] γ) := toGerm_injective.commMonoid toGerm one_toGerm mul_toGerm pow_toGerm section Group variable [Group γ] [IsTopologicalGroup γ] section Inv @[to_additive] instance instInv : Inv (α →ₘ[μ] γ) := ⟨comp Inv.inv continuous_inv⟩ @[to_additive (attr := simp)] theorem inv_mk (f : α → γ) (hf) : (mk f hf : α →ₘ[μ] γ)⁻¹ = mk f⁻¹ hf.inv := rfl @[to_additive] theorem coeFn_inv (f : α →ₘ[μ] γ) : ⇑f⁻¹ =ᵐ[μ] f⁻¹ := coeFn_comp _ _ _ @[to_additive] theorem inv_toGerm (f : α →ₘ[μ] γ) : f⁻¹.toGerm = f.toGerm⁻¹ := comp_toGerm _ _ _ end Inv section Div @[to_additive] instance instDiv : Div (α →ₘ[μ] γ) := ⟨comp₂ Div.div continuous_div'⟩ @[to_additive (attr := simp, nolint simpNF)] -- Porting note: LHS does not simplify. -- It seems the side conditions `hf` and `hg` are not applied by `simpNF`. theorem mk_div (f g : α → γ) (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) : mk (f / g) (hf.div hg) = (mk f hf : α →ₘ[μ] γ) / mk g hg := rfl @[to_additive] theorem coeFn_div (f g : α →ₘ[μ] γ) : ⇑(f / g) =ᵐ[μ] f / g := coeFn_comp₂ _ _ _ _ @[to_additive] theorem div_toGerm (f g : α →ₘ[μ] γ) : (f / g).toGerm = f.toGerm / g.toGerm := comp₂_toGerm _ _ _ _ end Div section ZPow instance instPowInt : Pow (α →ₘ[μ] γ) ℤ := ⟨fun f n => comp _ (continuous_zpow n) f⟩ @[simp] theorem mk_zpow (f : α → γ) (hf) (n : ℤ) : (mk f hf : α →ₘ[μ] γ) ^ n = mk (f ^ n) ((continuous_zpow n).comp_aestronglyMeasurable hf) := rfl theorem coeFn_zpow (f : α →ₘ[μ] γ) (n : ℤ) : ⇑(f ^ n) =ᵐ[μ] (⇑f) ^ n := coeFn_comp _ _ _ @[simp] theorem zpow_toGerm (f : α →ₘ[μ] γ) (n : ℤ) : (f ^ n).toGerm = f.toGerm ^ n := comp_toGerm _ _ _ end ZPow end Group instance instAddGroup [AddGroup γ] [IsTopologicalAddGroup γ] : AddGroup (α →ₘ[μ] γ) := toGerm_injective.addGroup toGerm zero_toGerm add_toGerm neg_toGerm sub_toGerm (fun _ _ => smul_toGerm _ _) fun _ _ => smul_toGerm _ _ instance instAddCommGroup [AddCommGroup γ] [IsTopologicalAddGroup γ] : AddCommGroup (α →ₘ[μ] γ) := { add_comm := add_comm } @[to_additive existing] instance instGroup [Group γ] [IsTopologicalGroup γ] : Group (α →ₘ[μ] γ) := toGerm_injective.group _ one_toGerm mul_toGerm inv_toGerm div_toGerm pow_toGerm zpow_toGerm @[to_additive existing] instance instCommGroup [CommGroup γ] [IsTopologicalGroup γ] : CommGroup (α →ₘ[μ] γ) := { mul_comm := mul_comm } section Module variable {𝕜 : Type} instance instMulAction [Monoid 𝕜] [MulAction 𝕜 γ] [ContinuousConstSMul 𝕜 γ] : MulAction 𝕜 (α →ₘ[μ] γ) := toGerm_injective.mulAction toGerm smul_toGerm instance instDistribMulAction [Monoid 𝕜] [AddMonoid γ] [ContinuousAdd γ] [DistribMulAction 𝕜 γ] [ContinuousConstSMul 𝕜 γ] : DistribMulAction 𝕜 (α →ₘ[μ] γ) := toGerm_injective.distribMulAction (toGermAddMonoidHom : (α →ₘ[μ] γ) →+ _) fun c : 𝕜 => smul_toGerm c instance instModule [Semiring 𝕜] [AddCommMonoid γ] [ContinuousAdd γ] [Module 𝕜 γ] [ContinuousConstSMul 𝕜 γ] : Module 𝕜 (α →ₘ[μ] γ) := toGerm_injective.module 𝕜 (toGermAddMonoidHom : (α →ₘ[μ] γ) →+ _) smul_toGerm end Module open ENNReal /-- For `f : α → ℝ≥0∞`, define `∫ [f]` to be `∫ f` -/ def lintegral (f : α →ₘ[μ] ℝ≥0∞) : ℝ≥0∞ := Quotient.liftOn' f (fun f => ∫⁻ a, (f : α → ℝ≥0∞) a ∂μ) fun _ _ => lintegral_congr_ae @[simp] theorem lintegral_mk (f : α → ℝ≥0∞) (hf) : (mk f hf : α →ₘ[μ] ℝ≥0∞).lintegral = ∫⁻ a, f a ∂μ := rfl theorem lintegral_coeFn (f : α →ₘ[μ] ℝ≥0∞) : ∫⁻ a, f a ∂μ = f.lintegral := by rw [← lintegral_mk, mk_coeFn] @[simp] nonrec theorem lintegral_zero : lintegral (0 : α →ₘ[μ] ℝ≥0∞) = 0 := lintegral_zero @[simp] theorem lintegral_eq_zero_iff {f : α →ₘ[μ] ℝ≥0∞} : lintegral f = 0 ↔ f = 0 := induction_on f fun _f hf => (lintegral_eq_zero_iff' hf.aemeasurable).trans mk_eq_mk.symm theorem lintegral_add (f g : α →ₘ[μ] ℝ≥0∞) : lintegral (f + g) = lintegral f + lintegral g := induction_on₂ f g fun f hf g _ => by simp [lintegral_add_left' hf.aemeasurable] theorem lintegral_mono {f g : α →ₘ[μ] ℝ≥0∞} : f ≤ g → lintegral f ≤ lintegral g := induction_on₂ f g fun _f _ _g _ hfg => lintegral_mono_ae hfg section Abs theorem coeFn_abs {β} [TopologicalSpace β] [Lattice β] [TopologicalLattice β] [AddGroup β] [IsTopologicalAddGroup β] (f : α →ₘ[μ] β) : ⇑\|f\| =ᵐ[μ] fun x => \|f x\| := by simp_rw [abs] filter_upwards [AEEqFun.coeFn_sup f (-f), AEEqFun.coeFn_neg f] with x hx_sup hx_neg rw [hx_sup, hx_neg, Pi.neg_apply] end Abs section PosPart variable [LinearOrder γ] [OrderClosedTopology γ] [Zero γ] /-- Positive part of an `AEEqFun`. -/ def posPart (f : α →ₘ[μ] γ) : α →ₘ[μ] γ := comp (fun x => max x 0) (continuous_id.max continuous_const) f @[simp] theorem posPart_mk (f : α → γ) (hf) : posPart (mk f hf : α →ₘ[μ] γ) = mk (fun x => max (f x) 0) ((continuous_id.max continuous_const).comp_aestronglyMeasurable hf) := rfl theorem coeFn_posPart (f : α →ₘ[μ] γ) : ⇑(posPart f) =ᵐ[μ] fun a => max (f a) 0 := coeFn_comp _ _ _ end PosPart section AELimit /-- The ae-limit is ae-unique. -/ theorem tendsto_ae_unique {ι : Type} [T2Space β] {g h : α → β} {f : ι → α → β} {l : Filter ι} [l.NeBot] (hg : ∀ᵐ ω ∂μ, Tendsto (fun i => f i ω) l (𝓝 (g ω))) (hh : ∀ᵐ ω ∂μ, Tendsto (fun i => f i ω) l (𝓝 (h ω))) : g =ᵐ[μ] h := by filter_upwards [hg, hh] with ω hg1 hh1 using tendsto_nhds_unique hg1 hh1 end AELimit end AEEqFun end MeasureTheory namespace ContinuousMap open MeasureTheory variable [TopologicalSpace α] [BorelSpace α] (μ) variable [TopologicalSpace β] [SecondCountableTopologyEither α β] [PseudoMetrizableSpace β] /-- The equivalence class of `μ`-almost-everywhere measurable functions associated to a continuous map. -/ def toAEEqFun (f : C(α, β)) : α →ₘ[μ] β := AEEqFun.mk f f.continuous.aestronglyMeasurable theorem coeFn_toAEEqFun (f : C(α, β)) : f.toAEEqFun μ =ᵐ[μ] f := AEEqFun.coeFn_mk f _ variable [Group β] [IsTopologicalGroup β] /-- The `MulHom` from the group of continuous maps from `α` to `β` to the group of equivalence classes of `μ`-almost-everywhere measurable functions. -/ @[to_additive "The `AddHom` from the group of continuous maps from `α` to `β` to the group of equivalence classes of `μ`-almost-everywhere measurable functions."] def toAEEqFunMulHom : C(α, β) →* α →ₘ[μ] β where toFun := ContinuousMap.toAEEqFun μ map_one' := rfl map_mul' f g := AEEqFun.mk_mul_mk _ _ f.continuous.aestronglyMeasurable g.continuous.aestronglyMeasurable variable {𝕜 : Type*} [Semiring 𝕜] variable [TopologicalSpace γ] [PseudoMetrizableSpace γ] [AddCommGroup γ] [Module 𝕜 γ] [IsTopologicalAddGroup γ] [ContinuousConstSMul 𝕜 γ] [SecondCountableTopologyEither α γ] /-- The linear map from the group of continuous maps from `α` to `β` to the group of equivalence classes of `μ`-almost-everywhere measurable functions. -/ def toAEEqFunLinearMap : C(α, γ) →ₗ[𝕜] α →ₘ[μ] γ := { toAEEqFunAddHom μ with map_smul' := fun c f => AEEqFun.smul_mk c f f.continuous.aestronglyMeasurable } end ContinuousMap		Mathlib/MeasureTheory/Function/AEEqFun.lean	941	942
/- Copyright (c) 2019 Zhouhang Zhou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Zhouhang Zhou, Sébastien Gouëzel, Frédéric Dupuis -/ import Mathlib.Algebra.BigOperators.Field import Mathlib.Analysis.Complex.Basic import Mathlib.Analysis.InnerProductSpace.Defs import Mathlib.GroupTheory.MonoidLocalization.Basic /-! # Properties of inner product spaces This file proves many basic properties of inner product spaces (real or complex). ## Main results - `inner_mul_inner_self_le`: the Cauchy-Schwartz inequality (one of many variants). - `norm_inner_eq_norm_iff`: the equality criteion in the Cauchy-Schwartz inequality (also in many variants). - `inner_eq_sum_norm_sq_div_four`: the polarization identity. ## Tags inner product space, Hilbert space, norm -/ noncomputable section open RCLike Real Filter Topology ComplexConjugate Finsupp open LinearMap (BilinForm) variable {𝕜 E F : Type} [RCLike 𝕜] section BasicProperties_Seminormed open scoped InnerProductSpace variable [SeminormedAddCommGroup E] [InnerProductSpace 𝕜 E] variable [SeminormedAddCommGroup F] [InnerProductSpace ℝ F] local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y local postfix:90 "†" => starRingEnd _ export InnerProductSpace (norm_sq_eq_re_inner) @[simp] theorem inner_conj_symm (x y : E) : ⟪y, x⟫† = ⟪x, y⟫ := InnerProductSpace.conj_inner_symm _ _ theorem real_inner_comm (x y : F) : ⟪y, x⟫_ℝ = ⟪x, y⟫_ℝ := @inner_conj_symm ℝ _ _ _ _ x y theorem inner_eq_zero_symm {x y : E} : ⟪x, y⟫ = 0 ↔ ⟪y, x⟫ = 0 := by rw [← inner_conj_symm] exact star_eq_zero @[simp] theorem inner_self_im (x : E) : im ⟪x, x⟫ = 0 := by rw [← @ofReal_inj 𝕜, im_eq_conj_sub]; simp theorem inner_add_left (x y z : E) : ⟪x + y, z⟫ = ⟪x, z⟫ + ⟪y, z⟫ := InnerProductSpace.add_left _ _ _ theorem inner_add_right (x y z : E) : ⟪x, y + z⟫ = ⟪x, y⟫ + ⟪x, z⟫ := by rw [← inner_conj_symm, inner_add_left, RingHom.map_add] simp only [inner_conj_symm] theorem inner_re_symm (x y : E) : re ⟪x, y⟫ = re ⟪y, x⟫ := by rw [← inner_conj_symm, conj_re] theorem inner_im_symm (x y : E) : im ⟪x, y⟫ = -im ⟪y, x⟫ := by rw [← inner_conj_symm, conj_im] section Algebra variable {𝕝 : Type} [CommSemiring 𝕝] [StarRing 𝕝] [Algebra 𝕝 𝕜] [Module 𝕝 E] [IsScalarTower 𝕝 𝕜 E] [StarModule 𝕝 𝕜] /-- See `inner_smul_left` for the common special when `𝕜 = 𝕝`. -/ lemma inner_smul_left_eq_star_smul (x y : E) (r : 𝕝) : ⟪r • x, y⟫ = r† • ⟪x, y⟫ := by rw [← algebraMap_smul 𝕜 r, InnerProductSpace.smul_left, starRingEnd_apply, starRingEnd_apply, ← algebraMap_star_comm, ← smul_eq_mul, algebraMap_smul] /-- Special case of `inner_smul_left_eq_star_smul` when the acting ring has a trivial star (eg `ℕ`, `ℤ`, `ℚ≥0`, `ℚ`, `ℝ`). -/ lemma inner_smul_left_eq_smul [TrivialStar 𝕝] (x y : E) (r : 𝕝) : ⟪r • x, y⟫ = r • ⟪x, y⟫ := by rw [inner_smul_left_eq_star_smul, starRingEnd_apply, star_trivial] /-- See `inner_smul_right` for the common special when `𝕜 = 𝕝`. -/ lemma inner_smul_right_eq_smul (x y : E) (r : 𝕝) : ⟪x, r • y⟫ = r • ⟪x, y⟫ := by rw [← inner_conj_symm, inner_smul_left_eq_star_smul, starRingEnd_apply, starRingEnd_apply, star_smul, star_star, ← starRingEnd_apply, inner_conj_symm] end Algebra /-- See `inner_smul_left_eq_star_smul` for the case of a general algebra action. -/ theorem inner_smul_left (x y : E) (r : 𝕜) : ⟪r • x, y⟫ = r† * ⟪x, y⟫ := inner_smul_left_eq_star_smul .. theorem real_inner_smul_left (x y : F) (r : ℝ) : ⟪r • x, y⟫_ℝ = r * ⟪x, y⟫_ℝ := inner_smul_left _ _ _ theorem inner_smul_real_left (x y : E) (r : ℝ) : ⟪(r : 𝕜) • x, y⟫ = r • ⟪x, y⟫ := by rw [inner_smul_left, conj_ofReal, Algebra.smul_def] /-- See `inner_smul_right_eq_smul` for the case of a general algebra action. -/ theorem inner_smul_right (x y : E) (r : 𝕜) : ⟪x, r • y⟫ = r * ⟪x, y⟫ := inner_smul_right_eq_smul .. theorem real_inner_smul_right (x y : F) (r : ℝ) : ⟪x, r • y⟫_ℝ = r * ⟪x, y⟫_ℝ := inner_smul_right _ _ _ theorem inner_smul_real_right (x y : E) (r : ℝ) : ⟪x, (r : 𝕜) • y⟫ = r • ⟪x, y⟫ := by rw [inner_smul_right, Algebra.smul_def] /-- The inner product as a sesquilinear form. Note that in the case `𝕜 = ℝ` this is a bilinear form. -/ @[simps!] def sesqFormOfInner : E →ₗ[𝕜] E →ₗ⋆[𝕜] 𝕜 := LinearMap.mk₂'ₛₗ (RingHom.id 𝕜) (starRingEnd _) (fun x y => ⟪y, x⟫) (fun _x _y _z => inner_add_right _ _ _) (fun _r _x _y => inner_smul_right _ _ _) (fun _x _y _z => inner_add_left _ _ _) fun _r _x _y => inner_smul_left _ _ _ /-- The real inner product as a bilinear form. Note that unlike `sesqFormOfInner`, this does not reverse the order of the arguments. -/ @[simps!] def bilinFormOfRealInner : BilinForm ℝ F := sesqFormOfInner.flip /-- An inner product with a sum on the left. -/ theorem sum_inner {ι : Type} (s : Finset ι) (f : ι → E) (x : E) : ⟪∑ i ∈ s, f i, x⟫ = ∑ i ∈ s, ⟪f i, x⟫ := map_sum (sesqFormOfInner (𝕜 := 𝕜) (E := E) x) _ _ /-- An inner product with a sum on the right. -/ theorem inner_sum {ι : Type} (s : Finset ι) (f : ι → E) (x : E) : ⟪x, ∑ i ∈ s, f i⟫ = ∑ i ∈ s, ⟪x, f i⟫ := map_sum (LinearMap.flip sesqFormOfInner x) _ _ /-- An inner product with a sum on the left, `Finsupp` version. -/ protected theorem Finsupp.sum_inner {ι : Type} (l : ι →₀ 𝕜) (v : ι → E) (x : E) : ⟪l.sum fun (i : ι) (a : 𝕜) => a • v i, x⟫ = l.sum fun (i : ι) (a : 𝕜) => conj a • ⟪v i, x⟫ := by convert sum_inner (𝕜 := 𝕜) l.support (fun a => l a • v a) x simp only [inner_smul_left, Finsupp.sum, smul_eq_mul] /-- An inner product with a sum on the right, `Finsupp` version. -/ protected theorem Finsupp.inner_sum {ι : Type} (l : ι →₀ 𝕜) (v : ι → E) (x : E) : ⟪x, l.sum fun (i : ι) (a : 𝕜) => a • v i⟫ = l.sum fun (i : ι) (a : 𝕜) => a • ⟪x, v i⟫ := by convert inner_sum (𝕜 := 𝕜) l.support (fun a => l a • v a) x simp only [inner_smul_right, Finsupp.sum, smul_eq_mul] protected theorem DFinsupp.sum_inner {ι : Type} [DecidableEq ι] {α : ι → Type} [∀ i, AddZeroClass (α i)] [∀ (i) (x : α i), Decidable (x ≠ 0)] (f : ∀ i, α i → E) (l : Π₀ i, α i) (x : E) : ⟪l.sum f, x⟫ = l.sum fun i a => ⟪f i a, x⟫ := by simp +contextual only [DFinsupp.sum, sum_inner, smul_eq_mul] protected theorem DFinsupp.inner_sum {ι : Type} [DecidableEq ι] {α : ι → Type} [∀ i, AddZeroClass (α i)] [∀ (i) (x : α i), Decidable (x ≠ 0)] (f : ∀ i, α i → E) (l : Π₀ i, α i) (x : E) : ⟪x, l.sum f⟫ = l.sum fun i a => ⟪x, f i a⟫ := by simp +contextual only [DFinsupp.sum, inner_sum, smul_eq_mul] @[simp] theorem inner_zero_left (x : E) : ⟪0, x⟫ = 0 := by rw [← zero_smul 𝕜 (0 : E), inner_smul_left, RingHom.map_zero, zero_mul] theorem inner_re_zero_left (x : E) : re ⟪0, x⟫ = 0 := by simp only [inner_zero_left, AddMonoidHom.map_zero] @[simp] theorem inner_zero_right (x : E) : ⟪x, 0⟫ = 0 := by rw [← inner_conj_symm, inner_zero_left, RingHom.map_zero] theorem inner_re_zero_right (x : E) : re ⟪x, 0⟫ = 0 := by simp only [inner_zero_right, AddMonoidHom.map_zero] theorem inner_self_nonneg {x : E} : 0 ≤ re ⟪x, x⟫ := PreInnerProductSpace.toCore.re_inner_nonneg x theorem real_inner_self_nonneg {x : F} : 0 ≤ ⟪x, x⟫_ℝ := @inner_self_nonneg ℝ F _ _ _ x @[simp] theorem inner_self_ofReal_re (x : E) : (re ⟪x, x⟫ : 𝕜) = ⟪x, x⟫ := ((RCLike.is_real_TFAE (⟪x, x⟫ : 𝕜)).out 2 3).2 (inner_self_im (𝕜 := 𝕜) x) theorem inner_self_eq_norm_sq_to_K (x : E) : ⟪x, x⟫ = (‖x‖ : 𝕜) ^ 2 := by rw [← inner_self_ofReal_re, ← norm_sq_eq_re_inner, ofReal_pow] theorem inner_self_re_eq_norm (x : E) : re ⟪x, x⟫ = ‖⟪x, x⟫‖ := by conv_rhs => rw [← inner_self_ofReal_re] symm exact norm_of_nonneg inner_self_nonneg theorem inner_self_ofReal_norm (x : E) : (‖⟪x, x⟫‖ : 𝕜) = ⟪x, x⟫ := by rw [← inner_self_re_eq_norm] exact inner_self_ofReal_re _ theorem real_inner_self_abs (x : F) : \|⟪x, x⟫_ℝ\| = ⟪x, x⟫_ℝ := @inner_self_ofReal_norm ℝ F _ _ _ x theorem norm_inner_symm (x y : E) : ‖⟪x, y⟫‖ = ‖⟪y, x⟫‖ := by rw [← inner_conj_symm, norm_conj] @[simp] theorem inner_neg_left (x y : E) : ⟪-x, y⟫ = -⟪x, y⟫ := by rw [← neg_one_smul 𝕜 x, inner_smul_left] simp @[simp] theorem inner_neg_right (x y : E) : ⟪x, -y⟫ = -⟪x, y⟫ := by rw [← inner_conj_symm, inner_neg_left]; simp only [RingHom.map_neg, inner_conj_symm] theorem inner_neg_neg (x y : E) : ⟪-x, -y⟫ = ⟪x, y⟫ := by simp theorem inner_self_conj (x : E) : ⟪x, x⟫† = ⟪x, x⟫ := inner_conj_symm _ _ theorem inner_sub_left (x y z : E) : ⟪x - y, z⟫ = ⟪x, z⟫ - ⟪y, z⟫ := by simp [sub_eq_add_neg, inner_add_left] theorem inner_sub_right (x y z : E) : ⟪x, y - z⟫ = ⟪x, y⟫ - ⟪x, z⟫ := by simp [sub_eq_add_neg, inner_add_right] theorem inner_mul_symm_re_eq_norm (x y : E) : re (⟪x, y⟫ * ⟪y, x⟫) = ‖⟪x, y⟫ * ⟪y, x⟫‖ := by rw [← inner_conj_symm, mul_comm] exact re_eq_norm_of_mul_conj (inner y x) /-- Expand `⟪x + y, x + y⟫` -/ theorem inner_add_add_self (x y : E) : ⟪x + y, x + y⟫ = ⟪x, x⟫ + ⟪x, y⟫ + ⟪y, x⟫ + ⟪y, y⟫ := by simp only [inner_add_left, inner_add_right]; ring /-- Expand `⟪x + y, x + y⟫_ℝ` -/ theorem real_inner_add_add_self (x y : F) : ⟪x + y, x + y⟫_ℝ = ⟪x, x⟫_ℝ + 2 * ⟪x, y⟫_ℝ + ⟪y, y⟫_ℝ := by have : ⟪y, x⟫_ℝ = ⟪x, y⟫_ℝ := by rw [← inner_conj_symm]; rfl simp only [inner_add_add_self, this, add_left_inj] ring -- Expand `⟪x - y, x - y⟫` theorem inner_sub_sub_self (x y : E) : ⟪x - y, x - y⟫ = ⟪x, x⟫ - ⟪x, y⟫ - ⟪y, x⟫ + ⟪y, y⟫ := by simp only [inner_sub_left, inner_sub_right]; ring /-- Expand `⟪x - y, x - y⟫_ℝ` -/ theorem real_inner_sub_sub_self (x y : F) : ⟪x - y, x - y⟫_ℝ = ⟪x, x⟫_ℝ - 2 * ⟪x, y⟫_ℝ + ⟪y, y⟫_ℝ := by have : ⟪y, x⟫_ℝ = ⟪x, y⟫_ℝ := by rw [← inner_conj_symm]; rfl simp only [inner_sub_sub_self, this, add_left_inj] ring /-- Parallelogram law -/ theorem parallelogram_law {x y : E} : ⟪x + y, x + y⟫ + ⟪x - y, x - y⟫ = 2 * (⟪x, x⟫ + ⟪y, y⟫) := by simp only [inner_add_add_self, inner_sub_sub_self] ring /-- Cauchy–Schwarz inequality. -/ theorem inner_mul_inner_self_le (x y : E) : ‖⟪x, y⟫‖ * ‖⟪y, x⟫‖ ≤ re ⟪x, x⟫ * re ⟪y, y⟫ := letI cd : PreInnerProductSpace.Core 𝕜 E := PreInnerProductSpace.toCore InnerProductSpace.Core.inner_mul_inner_self_le x y /-- Cauchy–Schwarz inequality for real inner products. -/ theorem real_inner_mul_inner_self_le (x y : F) : ⟪x, y⟫_ℝ * ⟪x, y⟫_ℝ ≤ ⟪x, x⟫_ℝ * ⟪y, y⟫_ℝ := calc ⟪x, y⟫_ℝ * ⟪x, y⟫_ℝ ≤ ‖⟪x, y⟫_ℝ‖ * ‖⟪y, x⟫_ℝ‖ := by rw [real_inner_comm y, ← norm_mul] exact le_abs_self _ _ ≤ ⟪x, x⟫_ℝ * ⟪y, y⟫_ℝ := @inner_mul_inner_self_le ℝ _ _ _ _ x y end BasicProperties_Seminormed section BasicProperties variable [NormedAddCommGroup E] [InnerProductSpace 𝕜 E] variable [NormedAddCommGroup F] [InnerProductSpace ℝ F] local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y export InnerProductSpace (norm_sq_eq_re_inner) @[simp] theorem inner_self_eq_zero {x : E} : ⟪x, x⟫ = 0 ↔ x = 0 := by rw [inner_self_eq_norm_sq_to_K, sq_eq_zero_iff, ofReal_eq_zero, norm_eq_zero] theorem inner_self_ne_zero {x : E} : ⟪x, x⟫ ≠ 0 ↔ x ≠ 0 := inner_self_eq_zero.not variable (𝕜) theorem ext_inner_left {x y : E} (h : ∀ v, ⟪v, x⟫ = ⟪v, y⟫) : x = y := by rw [← sub_eq_zero, ← @inner_self_eq_zero 𝕜, inner_sub_right, sub_eq_zero, h (x - y)] theorem ext_inner_right {x y : E} (h : ∀ v, ⟪x, v⟫ = ⟪y, v⟫) : x = y := by rw [← sub_eq_zero, ← @inner_self_eq_zero 𝕜, inner_sub_left, sub_eq_zero, h (x - y)] variable {𝕜} @[simp] theorem re_inner_self_nonpos {x : E} : re ⟪x, x⟫ ≤ 0 ↔ x = 0 := by rw [← norm_sq_eq_re_inner, (sq_nonneg _).le_iff_eq, sq_eq_zero_iff, norm_eq_zero] @[simp] lemma re_inner_self_pos {x : E} : 0 < re ⟪x, x⟫ ↔ x ≠ 0 := by simpa [-re_inner_self_nonpos] using re_inner_self_nonpos (𝕜 := 𝕜) (x := x).not @[deprecated (since := "2025-04-22")] alias inner_self_nonpos := re_inner_self_nonpos @[deprecated (since := "2025-04-22")] alias inner_self_pos := re_inner_self_pos open scoped InnerProductSpace in theorem real_inner_self_nonpos {x : F} : ⟪x, x⟫_ℝ ≤ 0 ↔ x = 0 := re_inner_self_nonpos (𝕜 := ℝ) open scoped InnerProductSpace in theorem real_inner_self_pos {x : F} : 0 < ⟪x, x⟫_ℝ ↔ x ≠ 0 := re_inner_self_pos (𝕜 := ℝ) /-- A family of vectors is linearly independent if they are nonzero and orthogonal. -/ theorem linearIndependent_of_ne_zero_of_inner_eq_zero {ι : Type} {v : ι → E} (hz : ∀ i, v i ≠ 0) (ho : Pairwise fun i j => ⟪v i, v j⟫ = 0) : LinearIndependent 𝕜 v := by rw [linearIndependent_iff'] intro s g hg i hi have h' : g i inner (v i) (v i) = inner (v i) (∑ j ∈ s, g j • v j) := by rw [inner_sum] symm convert Finset.sum_eq_single (M := 𝕜) i ?_ ?_ · rw [inner_smul_right] · intro j _hj hji rw [inner_smul_right, ho hji.symm, mul_zero] · exact fun h => False.elim (h hi) simpa [hg, hz] using h' end BasicProperties section Norm_Seminormed open scoped InnerProductSpace variable [SeminormedAddCommGroup E] [InnerProductSpace 𝕜 E] variable [SeminormedAddCommGroup F] [InnerProductSpace ℝ F] local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y local notation "IK" => @RCLike.I 𝕜 _ theorem norm_eq_sqrt_re_inner (x : E) : ‖x‖ = √(re ⟪x, x⟫) := calc ‖x‖ = √(‖x‖ ^ 2) := (sqrt_sq (norm_nonneg _)).symm _ = √(re ⟪x, x⟫) := congr_arg _ (norm_sq_eq_re_inner _) @[deprecated (since := "2025-04-22")] alias norm_eq_sqrt_inner := norm_eq_sqrt_re_inner theorem norm_eq_sqrt_real_inner (x : F) : ‖x‖ = √⟪x, x⟫_ℝ := @norm_eq_sqrt_re_inner ℝ _ _ _ _ x theorem inner_self_eq_norm_mul_norm (x : E) : re ⟪x, x⟫ = ‖x‖ * ‖x‖ := by rw [@norm_eq_sqrt_re_inner 𝕜, ← sqrt_mul inner_self_nonneg (re ⟪x, x⟫), sqrt_mul_self inner_self_nonneg] theorem inner_self_eq_norm_sq (x : E) : re ⟪x, x⟫ = ‖x‖ ^ 2 := by rw [pow_two, inner_self_eq_norm_mul_norm] theorem real_inner_self_eq_norm_mul_norm (x : F) : ⟪x, x⟫_ℝ = ‖x‖ * ‖x‖ := by have h := @inner_self_eq_norm_mul_norm ℝ F _ _ _ x simpa using h theorem real_inner_self_eq_norm_sq (x : F) : ⟪x, x⟫_ℝ = ‖x‖ ^ 2 := by rw [pow_two, real_inner_self_eq_norm_mul_norm] /-- Expand the square -/ theorem norm_add_sq (x y : E) : ‖x + y‖ ^ 2 = ‖x‖ ^ 2 + 2 * re ⟪x, y⟫ + ‖y‖ ^ 2 := by repeat' rw [sq (M := ℝ), ← @inner_self_eq_norm_mul_norm 𝕜] rw [inner_add_add_self, two_mul] simp only [add_assoc, add_left_inj, add_right_inj, AddMonoidHom.map_add] rw [← inner_conj_symm, conj_re] alias norm_add_pow_two := norm_add_sq /-- Expand the square -/ theorem norm_add_sq_real (x y : F) : ‖x + y‖ ^ 2 = ‖x‖ ^ 2 + 2 * ⟪x, y⟫_ℝ + ‖y‖ ^ 2 := by have h := @norm_add_sq ℝ _ _ _ _ x y simpa using h alias norm_add_pow_two_real := norm_add_sq_real /-- Expand the square -/ theorem norm_add_mul_self (x y : E) : ‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + 2 * re ⟪x, y⟫ + ‖y‖ * ‖y‖ := by repeat' rw [← sq (M := ℝ)] exact norm_add_sq _ _ /-- Expand the square -/ theorem norm_add_mul_self_real (x y : F) : ‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + 2 * ⟪x, y⟫_ℝ + ‖y‖ * ‖y‖ := by have h := @norm_add_mul_self ℝ _ _ _ _ x y simpa using h /-- Expand the square -/ theorem norm_sub_sq (x y : E) : ‖x - y‖ ^ 2 = ‖x‖ ^ 2 - 2 * re ⟪x, y⟫ + ‖y‖ ^ 2 := by rw [sub_eq_add_neg, @norm_add_sq 𝕜 _ _ _ _ x (-y), norm_neg, inner_neg_right, map_neg, mul_neg, sub_eq_add_neg] alias norm_sub_pow_two := norm_sub_sq /-- Expand the square -/ theorem norm_sub_sq_real (x y : F) : ‖x - y‖ ^ 2 = ‖x‖ ^ 2 - 2 * ⟪x, y⟫_ℝ + ‖y‖ ^ 2 := @norm_sub_sq ℝ _ _ _ _ _ _ alias norm_sub_pow_two_real := norm_sub_sq_real /-- Expand the square -/ theorem norm_sub_mul_self (x y : E) : ‖x - y‖ * ‖x - y‖ = ‖x‖ * ‖x‖ - 2 * re ⟪x, y⟫ + ‖y‖ * ‖y‖ := by repeat' rw [← sq (M := ℝ)] exact norm_sub_sq _ _ /-- Expand the square -/ theorem norm_sub_mul_self_real (x y : F) : ‖x - y‖ * ‖x - y‖ = ‖x‖ * ‖x‖ - 2 * ⟪x, y⟫_ℝ + ‖y‖ * ‖y‖ := by have h := @norm_sub_mul_self ℝ _ _ _ _ x y simpa using h /-- Cauchy–Schwarz inequality with norm -/ theorem norm_inner_le_norm (x y : E) : ‖⟪x, y⟫‖ ≤ ‖x‖ * ‖y‖ := by rw [norm_eq_sqrt_re_inner (𝕜 := 𝕜) x, norm_eq_sqrt_re_inner (𝕜 := 𝕜) y] letI : PreInnerProductSpace.Core 𝕜 E := PreInnerProductSpace.toCore exact InnerProductSpace.Core.norm_inner_le_norm x y theorem nnnorm_inner_le_nnnorm (x y : E) : ‖⟪x, y⟫‖₊ ≤ ‖x‖₊ * ‖y‖₊ := norm_inner_le_norm x y theorem re_inner_le_norm (x y : E) : re ⟪x, y⟫ ≤ ‖x‖ * ‖y‖ := le_trans (re_le_norm (inner x y)) (norm_inner_le_norm x y) /-- Cauchy–Schwarz inequality with norm -/ theorem abs_real_inner_le_norm (x y : F) : \|⟪x, y⟫_ℝ\| ≤ ‖x‖ * ‖y‖ := (Real.norm_eq_abs _).ge.trans (norm_inner_le_norm x y) /-- Cauchy–Schwarz inequality with norm -/ theorem real_inner_le_norm (x y : F) : ⟪x, y⟫_ℝ ≤ ‖x‖ * ‖y‖ := le_trans (le_abs_self _) (abs_real_inner_le_norm _ _) lemma inner_eq_zero_of_left {x : E} (y : E) (h : ‖x‖ = 0) : ⟪x, y⟫_𝕜 = 0 := by rw [← norm_eq_zero] refine le_antisymm ?_ (by positivity) exact norm_inner_le_norm _ _ \|>.trans <\| by simp [h] lemma inner_eq_zero_of_right (x : E) {y : E} (h : ‖y‖ = 0) : ⟪x, y⟫_𝕜 = 0 := by rw [inner_eq_zero_symm, inner_eq_zero_of_left _ h] variable (𝕜) include 𝕜 in theorem parallelogram_law_with_norm (x y : E) : ‖x + y‖ * ‖x + y‖ + ‖x - y‖ * ‖x - y‖ = 2 * (‖x‖ * ‖x‖ + ‖y‖ * ‖y‖) := by simp only [← @inner_self_eq_norm_mul_norm 𝕜] rw [← re.map_add, parallelogram_law, two_mul, two_mul] simp only [re.map_add] include 𝕜 in theorem parallelogram_law_with_nnnorm (x y : E) : ‖x + y‖₊ * ‖x + y‖₊ + ‖x - y‖₊ * ‖x - y‖₊ = 2 * (‖x‖₊ * ‖x‖₊ + ‖y‖₊ * ‖y‖₊) := Subtype.ext <\| parallelogram_law_with_norm 𝕜 x y variable {𝕜} /-- Polarization identity: The real part of the inner product, in terms of the norm. -/ theorem re_inner_eq_norm_add_mul_self_sub_norm_mul_self_sub_norm_mul_self_div_two (x y : E) : re ⟪x, y⟫ = (‖x + y‖ * ‖x + y‖ - ‖x‖ * ‖x‖ - ‖y‖ * ‖y‖) / 2 := by rw [@norm_add_mul_self 𝕜] ring /-- Polarization identity: The real part of the inner product, in terms of the norm. -/ theorem re_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two (x y : E) : re ⟪x, y⟫ = (‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ - ‖x - y‖ * ‖x - y‖) / 2 := by rw [@norm_sub_mul_self 𝕜] ring /-- Polarization identity: The real part of the inner product, in terms of the norm. -/ theorem re_inner_eq_norm_add_mul_self_sub_norm_sub_mul_self_div_four (x y : E) : re ⟪x, y⟫ = (‖x + y‖ * ‖x + y‖ - ‖x - y‖ * ‖x - y‖) / 4 := by rw [@norm_add_mul_self 𝕜, @norm_sub_mul_self 𝕜] ring /-- Polarization identity: The imaginary part of the inner product, in terms of the norm. -/ theorem im_inner_eq_norm_sub_i_smul_mul_self_sub_norm_add_i_smul_mul_self_div_four (x y : E) : im ⟪x, y⟫ = (‖x - IK • y‖ * ‖x - IK • y‖ - ‖x + IK • y‖ * ‖x + IK • y‖) / 4 := by simp only [@norm_add_mul_self 𝕜, @norm_sub_mul_self 𝕜, inner_smul_right, I_mul_re] ring /-- Polarization identity: The inner product, in terms of the norm. -/ theorem inner_eq_sum_norm_sq_div_four (x y : E) : ⟪x, y⟫ = ((‖x + y‖ : 𝕜) ^ 2 - (‖x - y‖ : 𝕜) ^ 2 + ((‖x - IK • y‖ : 𝕜) ^ 2 - (‖x + IK • y‖ : 𝕜) ^ 2) * IK) / 4 := by rw [← re_add_im ⟪x, y⟫, re_inner_eq_norm_add_mul_self_sub_norm_sub_mul_self_div_four, im_inner_eq_norm_sub_i_smul_mul_self_sub_norm_add_i_smul_mul_self_div_four] push_cast simp only [sq, ← mul_div_right_comm, ← add_div] /-- Polarization identity: The real inner product, in terms of the norm. -/ theorem real_inner_eq_norm_add_mul_self_sub_norm_mul_self_sub_norm_mul_self_div_two (x y : F) : ⟪x, y⟫_ℝ = (‖x + y‖ * ‖x + y‖ - ‖x‖ * ‖x‖ - ‖y‖ * ‖y‖) / 2 := re_to_real.symm.trans <\| re_inner_eq_norm_add_mul_self_sub_norm_mul_self_sub_norm_mul_self_div_two x y /-- Polarization identity: The real inner product, in terms of the norm. -/ theorem real_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two (x y : F) : ⟪x, y⟫_ℝ = (‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ - ‖x - y‖ * ‖x - y‖) / 2 := re_to_real.symm.trans <\| re_inner_eq_norm_mul_self_add_norm_mul_self_sub_norm_sub_mul_self_div_two x y /-- Pythagorean theorem, if-and-only-if vector inner product form. -/ theorem norm_add_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero (x y : F) : ‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ ↔ ⟪x, y⟫_ℝ = 0 := by rw [@norm_add_mul_self ℝ, add_right_cancel_iff, add_eq_left, mul_eq_zero] norm_num /-- Pythagorean theorem, if-and-if vector inner product form using square roots. -/ theorem norm_add_eq_sqrt_iff_real_inner_eq_zero {x y : F} : ‖x + y‖ = √(‖x‖ * ‖x‖ + ‖y‖ * ‖y‖) ↔ ⟪x, y⟫_ℝ = 0 := by rw [← norm_add_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero, eq_comm, sqrt_eq_iff_mul_self_eq, eq_comm] <;> positivity /-- Pythagorean theorem, vector inner product form. -/ theorem norm_add_sq_eq_norm_sq_add_norm_sq_of_inner_eq_zero (x y : E) (h : ⟪x, y⟫ = 0) : ‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ := by rw [@norm_add_mul_self 𝕜, add_right_cancel_iff, add_eq_left, mul_eq_zero] apply Or.inr simp only [h, zero_re']	/-- Pythagorean theorem, vector inner product form. -/ theorem norm_add_sq_eq_norm_sq_add_norm_sq_real {x y : F} (h : ⟪x, y⟫_ℝ = 0) : ‖x + y‖ * ‖x + y‖ = ‖x‖ * ‖x‖ + ‖y‖ * ‖y‖ := (norm_add_sq_eq_norm_sq_add_norm_sq_iff_real_inner_eq_zero x y).2 h	Mathlib/Analysis/InnerProductSpace/Basic.lean	527	530
/- Copyright (c) 2018 Simon Hudon. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Simon Hudon -/ import Mathlib.Control.Applicative import Mathlib.Control.Traversable.Basic /-! # Traversing collections This file proves basic properties of traversable and applicative functors and defines `PureTransformation F`, the natural applicative transformation from the identity functor to `F`. ## References Inspired by [The Essence of the Iterator Pattern][gibbons2009]. -/ universe u open LawfulTraversable open Function hiding comp open Functor attribute [functor_norm] LawfulTraversable.naturality attribute [simp] LawfulTraversable.id_traverse namespace Traversable variable {t : Type u → Type u} variable [Traversable t] [LawfulTraversable t] variable (F G : Type u → Type u) variable [Applicative F] [LawfulApplicative F] variable [Applicative G] [LawfulApplicative G] variable {α β γ : Type u} variable (g : α → F β) variable (f : β → γ) /-- The natural applicative transformation from the identity functor to `F`, defined by `pure : Π {α}, α → F α`. -/ def PureTransformation : ApplicativeTransformation Id F where app := @pure F _ preserves_pure' _ := rfl preserves_seq' f x := by simp only [map_pure, seq_pure] rfl @[simp] theorem pureTransformation_apply {α} (x : id α) : PureTransformation F x = pure x := rfl variable {F G} -- Porting note: need to specify `m/F/G := Id` because `id` no longer has a `Monad` instance theorem map_eq_traverse_id : map (f := t) f = traverse (m := Id) (pure ∘ f) := funext fun y => (traverse_eq_map_id f y).symm theorem map_traverse (x : t α) : map f <$> traverse g x = traverse (map f ∘ g) x := by rw [map_eq_traverse_id f] refine (comp_traverse (pure ∘ f) g x).symm.trans ?_ congr; apply Comp.applicative_comp_id theorem traverse_map (f : β → F γ) (g : α → β) (x : t α) : traverse f (g <$> x) = traverse (f ∘ g) x := by rw [@map_eq_traverse_id t _ _ _ _ g] refine (comp_traverse (G := Id) f (pure ∘ g) x).symm.trans ?_ congr; apply Comp.applicative_id_comp theorem pure_traverse (x : t α) : traverse pure x = (pure x : F (t α)) := by have : traverse pure x = pure (traverse (m := Id) pure x) := (naturality (PureTransformation F) pure x).symm rwa [id_traverse] at this theorem id_sequence (x : t α) : sequence (f := Id) (pure <$> x) = pure x := by simp [sequence, traverse_map, id_traverse] theorem comp_sequence (x : t (F (G α))) : sequence (Comp.mk <$> x) = Comp.mk (sequence <$> sequence x) := by simp only [sequence, traverse_map, id_comp]; rw [← comp_traverse]; simp [map_id] theorem naturality' (η : ApplicativeTransformation F G) (x : t (F α)) : η (sequence x) = sequence (@η _ <$> x) := by simp [sequence, naturality, traverse_map] @[functor_norm] theorem traverse_id : traverse pure = (pure : t α → Id (t α)) := by ext	exact id_traverse _ @[functor_norm]	Mathlib/Control/Traversable/Lemmas.lean	93	95
/- Copyright (c) 2024 Josha Dekker. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Josha Dekker, Devon Tuma, Kexing Ying -/ import Mathlib.Probability.Notation import Mathlib.Probability.Density import Mathlib.Probability.ConditionalProbability import Mathlib.Probability.ProbabilityMassFunction.Constructions /-! # Uniform distributions and probability mass functions This file defines two related notions of uniform distributions, which will be unified in the future. # Uniform distributions Defines the uniform distribution for any set with finite measure. ## Main definitions * `IsUniform X s ℙ μ` : A random variable `X` has uniform distribution on `s` under `ℙ` if the push-forward measure agrees with the rescaled restricted measure `μ`. # Uniform probability mass functions This file defines a number of uniform `PMF` distributions from various inputs, uniformly drawing from the corresponding object. ## Main definitions `PMF.uniformOfFinset` gives each element in the set equal probability, with `0` probability for elements not in the set. `PMF.uniformOfFintype` gives all elements equal probability, equal to the inverse of the size of the `Fintype`. `PMF.ofMultiset` draws randomly from the given `Multiset`, treating duplicate values as distinct. Each probability is given by the count of the element divided by the size of the `Multiset` ## TODO * Refactor the `PMF` definitions to come from a `uniformMeasure` on a `Finset`/`Fintype`/`Multiset`. -/ open scoped Finset MeasureTheory NNReal ENNReal -- TODO: We can't `open ProbabilityTheory` without opening the `ProbabilityTheory` locale :( open TopologicalSpace MeasureTheory.Measure PMF noncomputable section namespace MeasureTheory variable {E : Type} [MeasurableSpace E] {μ : Measure E} namespace pdf variable {Ω : Type} variable {_ : MeasurableSpace Ω} {ℙ : Measure Ω} /-- A random variable `X` has uniform distribution on `s` if its push-forward measure is `(μ s)⁻¹ • μ.restrict s`. -/ def IsUniform (X : Ω → E) (s : Set E) (ℙ : Measure Ω) (μ : Measure E := by volume_tac) := map X ℙ = ProbabilityTheory.cond μ s namespace IsUniform theorem aemeasurable {X : Ω → E} {s : Set E} (hns : μ s ≠ 0) (hnt : μ s ≠ ∞) (hu : IsUniform X s ℙ μ) : AEMeasurable X ℙ := by dsimp [IsUniform, ProbabilityTheory.cond] at hu by_contra h rw [map_of_not_aemeasurable h] at hu apply zero_ne_one' ℝ≥0∞ calc 0 = (0 : Measure E) Set.univ := rfl _ = _ := by rw [hu, smul_apply, restrict_apply MeasurableSet.univ, Set.univ_inter, smul_eq_mul, ENNReal.inv_mul_cancel hns hnt] theorem absolutelyContinuous {X : Ω → E} {s : Set E} (hu : IsUniform X s ℙ μ) : map X ℙ ≪ μ := by	rw [hu]; exact ProbabilityTheory.cond_absolutelyContinuous	Mathlib/Probability/Distributions/Uniform.lean	77	78
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mario Carneiro, Yury Kudryashov -/ import Mathlib.Order.Filter.Tendsto import Mathlib.Data.Set.Accumulate import Mathlib.Topology.Bornology.Basic import Mathlib.Topology.ContinuousOn import Mathlib.Topology.Ultrafilter import Mathlib.Topology.Defs.Ultrafilter /-! # Compact sets and compact spaces ## Main results * `isCompact_univ_pi`: Tychonov's theorem - an arbitrary product of compact sets is compact. -/ open Set Filter Topology TopologicalSpace Function universe u v variable {X : Type u} {Y : Type v} {ι : Type} variable [TopologicalSpace X] [TopologicalSpace Y] {s t : Set X} {f : X → Y} -- compact sets section Compact lemma IsCompact.exists_clusterPt (hs : IsCompact s) {f : Filter X} [NeBot f] (hf : f ≤ 𝓟 s) : ∃ x ∈ s, ClusterPt x f := hs hf lemma IsCompact.exists_mapClusterPt {ι : Type} (hs : IsCompact s) {f : Filter ι} [NeBot f] {u : ι → X} (hf : Filter.map u f ≤ 𝓟 s) : ∃ x ∈ s, MapClusterPt x f u := hs hf lemma IsCompact.exists_clusterPt_of_frequently {l : Filter X} (hs : IsCompact s) (hl : ∃ᶠ x in l, x ∈ s) : ∃ a ∈ s, ClusterPt a l := let ⟨a, has, ha⟩ := @hs _ (frequently_mem_iff_neBot.mp hl) inf_le_right ⟨a, has, ha.mono inf_le_left⟩ lemma IsCompact.exists_mapClusterPt_of_frequently {l : Filter ι} {f : ι → X} (hs : IsCompact s) (hf : ∃ᶠ x in l, f x ∈ s) : ∃ a ∈ s, MapClusterPt a l f := hs.exists_clusterPt_of_frequently hf /-- The complement to a compact set belongs to a filter `f` if it belongs to each filter `𝓝 x ⊓ f`, `x ∈ s`. -/ theorem IsCompact.compl_mem_sets (hs : IsCompact s) {f : Filter X} (hf : ∀ x ∈ s, sᶜ ∈ 𝓝 x ⊓ f) : sᶜ ∈ f := by contrapose! hf simp only [not_mem_iff_inf_principal_compl, compl_compl, inf_assoc] at hf ⊢ exact @hs _ hf inf_le_right /-- The complement to a compact set belongs to a filter `f` if each `x ∈ s` has a neighborhood `t` within `s` such that `tᶜ` belongs to `f`. -/ theorem IsCompact.compl_mem_sets_of_nhdsWithin (hs : IsCompact s) {f : Filter X} (hf : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, tᶜ ∈ f) : sᶜ ∈ f := by refine hs.compl_mem_sets fun x hx => ?_ rcases hf x hx with ⟨t, ht, hst⟩ replace ht := mem_inf_principal.1 ht apply mem_inf_of_inter ht hst rintro x ⟨h₁, h₂⟩ hs exact h₂ (h₁ hs) /-- If `p : Set X → Prop` is stable under restriction and union, and each point `x` of a compact set `s` has a neighborhood `t` within `s` such that `p t`, then `p s` holds. -/ @[elab_as_elim] theorem IsCompact.induction_on (hs : IsCompact s) {p : Set X → Prop} (he : p ∅) (hmono : ∀ ⦃s t⦄, s ⊆ t → p t → p s) (hunion : ∀ ⦃s t⦄, p s → p t → p (s ∪ t)) (hnhds : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, p t) : p s := by let f : Filter X := comk p he (fun _t ht _s hsub ↦ hmono hsub ht) (fun _s hs _t ht ↦ hunion hs ht) have : sᶜ ∈ f := hs.compl_mem_sets_of_nhdsWithin (by simpa [f] using hnhds) rwa [← compl_compl s] /-- The intersection of a compact set and a closed set is a compact set. -/ theorem IsCompact.inter_right (hs : IsCompact s) (ht : IsClosed t) : IsCompact (s ∩ t) := by intro f hnf hstf obtain ⟨x, hsx, hx⟩ : ∃ x ∈ s, ClusterPt x f := hs (le_trans hstf (le_principal_iff.2 inter_subset_left)) have : x ∈ t := ht.mem_of_nhdsWithin_neBot <\| hx.mono <\| le_trans hstf (le_principal_iff.2 inter_subset_right) exact ⟨x, ⟨hsx, this⟩, hx⟩ /-- The intersection of a closed set and a compact set is a compact set. -/ theorem IsCompact.inter_left (ht : IsCompact t) (hs : IsClosed s) : IsCompact (s ∩ t) := inter_comm t s ▸ ht.inter_right hs /-- The set difference of a compact set and an open set is a compact set. -/ theorem IsCompact.diff (hs : IsCompact s) (ht : IsOpen t) : IsCompact (s \ t) := hs.inter_right (isClosed_compl_iff.mpr ht) /-- A closed subset of a compact set is a compact set. -/ theorem IsCompact.of_isClosed_subset (hs : IsCompact s) (ht : IsClosed t) (h : t ⊆ s) : IsCompact t := inter_eq_self_of_subset_right h ▸ hs.inter_right ht theorem IsCompact.image_of_continuousOn {f : X → Y} (hs : IsCompact s) (hf : ContinuousOn f s) : IsCompact (f '' s) := by intro l lne ls have : NeBot (l.comap f ⊓ 𝓟 s) := comap_inf_principal_neBot_of_image_mem lne (le_principal_iff.1 ls) obtain ⟨x, hxs, hx⟩ : ∃ x ∈ s, ClusterPt x (l.comap f ⊓ 𝓟 s) := @hs _ this inf_le_right haveI := hx.neBot use f x, mem_image_of_mem f hxs have : Tendsto f (𝓝 x ⊓ (comap f l ⊓ 𝓟 s)) (𝓝 (f x) ⊓ l) := by convert (hf x hxs).inf (@tendsto_comap _ _ f l) using 1 rw [nhdsWithin] ac_rfl exact this.neBot theorem IsCompact.image {f : X → Y} (hs : IsCompact s) (hf : Continuous f) : IsCompact (f '' s) := hs.image_of_continuousOn hf.continuousOn theorem IsCompact.adherence_nhdset {f : Filter X} (hs : IsCompact s) (hf₂ : f ≤ 𝓟 s) (ht₁ : IsOpen t) (ht₂ : ∀ x ∈ s, ClusterPt x f → x ∈ t) : t ∈ f := Classical.by_cases mem_of_eq_bot fun (this : f ⊓ 𝓟 tᶜ ≠ ⊥) => let ⟨x, hx, (hfx : ClusterPt x <\| f ⊓ 𝓟 tᶜ)⟩ := @hs _ ⟨this⟩ <\| inf_le_of_left_le hf₂ have : x ∈ t := ht₂ x hx hfx.of_inf_left have : tᶜ ∩ t ∈ 𝓝[tᶜ] x := inter_mem_nhdsWithin _ (IsOpen.mem_nhds ht₁ this) have A : 𝓝[tᶜ] x = ⊥ := empty_mem_iff_bot.1 <\| compl_inter_self t ▸ this have : 𝓝[tᶜ] x ≠ ⊥ := hfx.of_inf_right.ne absurd A this theorem isCompact_iff_ultrafilter_le_nhds : IsCompact s ↔ ∀ f : Ultrafilter X, ↑f ≤ 𝓟 s → ∃ x ∈ s, ↑f ≤ 𝓝 x := by refine (forall_neBot_le_iff ?_).trans ?_ · rintro f g hle ⟨x, hxs, hxf⟩ exact ⟨x, hxs, hxf.mono hle⟩ · simp only [Ultrafilter.clusterPt_iff] alias ⟨IsCompact.ultrafilter_le_nhds, _⟩ := isCompact_iff_ultrafilter_le_nhds theorem isCompact_iff_ultrafilter_le_nhds' : IsCompact s ↔ ∀ f : Ultrafilter X, s ∈ f → ∃ x ∈ s, ↑f ≤ 𝓝 x := by simp only [isCompact_iff_ultrafilter_le_nhds, le_principal_iff, Ultrafilter.mem_coe] alias ⟨IsCompact.ultrafilter_le_nhds', _⟩ := isCompact_iff_ultrafilter_le_nhds' /-- If a compact set belongs to a filter and this filter has a unique cluster point `y` in this set, then the filter is less than or equal to `𝓝 y`. -/ lemma IsCompact.le_nhds_of_unique_clusterPt (hs : IsCompact s) {l : Filter X} {y : X} (hmem : s ∈ l) (h : ∀ x ∈ s, ClusterPt x l → x = y) : l ≤ 𝓝 y := by refine le_iff_ultrafilter.2 fun f hf ↦ ?_ rcases hs.ultrafilter_le_nhds' f (hf hmem) with ⟨x, hxs, hx⟩ convert ← hx exact h x hxs (.mono (.of_le_nhds hx) hf) /-- If values of `f : Y → X` belong to a compact set `s` eventually along a filter `l` and `y` is a unique `MapClusterPt` for `f` along `l` in `s`, then `f` tends to `𝓝 y` along `l`. -/ lemma IsCompact.tendsto_nhds_of_unique_mapClusterPt {Y} {l : Filter Y} {y : X} {f : Y → X} (hs : IsCompact s) (hmem : ∀ᶠ x in l, f x ∈ s) (h : ∀ x ∈ s, MapClusterPt x l f → x = y) : Tendsto f l (𝓝 y) := hs.le_nhds_of_unique_clusterPt (mem_map.2 hmem) h /-- For every open directed cover of a compact set, there exists a single element of the cover which itself includes the set. -/ theorem IsCompact.elim_directed_cover {ι : Type v} [hι : Nonempty ι] (hs : IsCompact s) (U : ι → Set X) (hUo : ∀ i, IsOpen (U i)) (hsU : s ⊆ ⋃ i, U i) (hdU : Directed (· ⊆ ·) U) : ∃ i, s ⊆ U i := hι.elim fun i₀ => IsCompact.induction_on hs ⟨i₀, empty_subset _⟩ (fun _ _ hs ⟨i, hi⟩ => ⟨i, hs.trans hi⟩) (fun _ _ ⟨i, hi⟩ ⟨j, hj⟩ => let ⟨k, hki, hkj⟩ := hdU i j ⟨k, union_subset (Subset.trans hi hki) (Subset.trans hj hkj)⟩) fun _x hx => let ⟨i, hi⟩ := mem_iUnion.1 (hsU hx) ⟨U i, mem_nhdsWithin_of_mem_nhds (IsOpen.mem_nhds (hUo i) hi), i, Subset.refl _⟩ /-- For every open cover of a compact set, there exists a finite subcover. -/ theorem IsCompact.elim_finite_subcover {ι : Type v} (hs : IsCompact s) (U : ι → Set X) (hUo : ∀ i, IsOpen (U i)) (hsU : s ⊆ ⋃ i, U i) : ∃ t : Finset ι, s ⊆ ⋃ i ∈ t, U i := hs.elim_directed_cover _ (fun _ => isOpen_biUnion fun i _ => hUo i) (iUnion_eq_iUnion_finset U ▸ hsU) (directed_of_isDirected_le fun _ _ h => biUnion_subset_biUnion_left h) lemma IsCompact.elim_nhds_subcover_nhdsSet' (hs : IsCompact s) (U : ∀ x ∈ s, Set X) (hU : ∀ x hx, U x hx ∈ 𝓝 x) : ∃ t : Finset s, (⋃ x ∈ t, U x.1 x.2) ∈ 𝓝ˢ s := by rcases hs.elim_finite_subcover (fun x : s ↦ interior (U x x.2)) (fun _ ↦ isOpen_interior) fun x hx ↦ mem_iUnion.2 ⟨⟨x, hx⟩, mem_interior_iff_mem_nhds.2 <\| hU _ _⟩ with ⟨t, hst⟩ refine ⟨t, mem_nhdsSet_iff_forall.2 fun x hx ↦ ?_⟩ rcases mem_iUnion₂.1 (hst hx) with ⟨y, hyt, hy⟩ refine mem_of_superset ?_ (subset_biUnion_of_mem hyt) exact mem_interior_iff_mem_nhds.1 hy lemma IsCompact.elim_nhds_subcover_nhdsSet (hs : IsCompact s) {U : X → Set X} (hU : ∀ x ∈ s, U x ∈ 𝓝 x) : ∃ t : Finset X, (∀ x ∈ t, x ∈ s) ∧ (⋃ x ∈ t, U x) ∈ 𝓝ˢ s := by let ⟨t, ht⟩ := hs.elim_nhds_subcover_nhdsSet' (fun x _ => U x) hU classical exact ⟨t.image (↑), fun x hx => let ⟨y, _, hyx⟩ := Finset.mem_image.1 hx hyx ▸ y.2, by rwa [Finset.set_biUnion_finset_image]⟩ theorem IsCompact.elim_nhds_subcover' (hs : IsCompact s) (U : ∀ x ∈ s, Set X) (hU : ∀ x (hx : x ∈ s), U x ‹x ∈ s› ∈ 𝓝 x) : ∃ t : Finset s, s ⊆ ⋃ x ∈ t, U (x : s) x.2 := (hs.elim_nhds_subcover_nhdsSet' U hU).imp fun _ ↦ subset_of_mem_nhdsSet theorem IsCompact.elim_nhds_subcover (hs : IsCompact s) (U : X → Set X) (hU : ∀ x ∈ s, U x ∈ 𝓝 x) : ∃ t : Finset X, (∀ x ∈ t, x ∈ s) ∧ s ⊆ ⋃ x ∈ t, U x := (hs.elim_nhds_subcover_nhdsSet hU).imp fun _ h ↦ h.imp_right subset_of_mem_nhdsSet theorem IsCompact.elim_nhdsWithin_subcover' (hs : IsCompact s) (U : ∀ x ∈ s, Set X) (hU : ∀ x (hx : x ∈ s), U x hx ∈ 𝓝[s] x) : ∃ t : Finset s, s ⊆ ⋃ x ∈ t, U x x.2 := by choose V V_nhds hV using fun x hx => mem_nhdsWithin_iff_exists_mem_nhds_inter.1 (hU x hx) refine (hs.elim_nhds_subcover' V V_nhds).imp fun t ht => subset_trans ?_ (iUnion₂_mono fun x _ => hV x x.2) simpa [← iUnion_inter, ← iUnion_coe_set] theorem IsCompact.elim_nhdsWithin_subcover (hs : IsCompact s) (U : X → Set X) (hU : ∀ x ∈ s, U x ∈ 𝓝[s] x) : ∃ t : Finset X, (∀ x ∈ t, x ∈ s) ∧ s ⊆ ⋃ x ∈ t, U x := by choose! V V_nhds hV using fun x hx => mem_nhdsWithin_iff_exists_mem_nhds_inter.1 (hU x hx) refine (hs.elim_nhds_subcover V V_nhds).imp fun t ⟨t_sub_s, ht⟩ => ⟨t_sub_s, subset_trans ?_ (iUnion₂_mono fun x hx => hV x (t_sub_s x hx))⟩ simpa [← iUnion_inter] /-- The neighborhood filter of a compact set is disjoint with a filter `l` if and only if the neighborhood filter of each point of this set is disjoint with `l`. -/ theorem IsCompact.disjoint_nhdsSet_left {l : Filter X} (hs : IsCompact s) : Disjoint (𝓝ˢ s) l ↔ ∀ x ∈ s, Disjoint (𝓝 x) l := by refine ⟨fun h x hx => h.mono_left <\| nhds_le_nhdsSet hx, fun H => ?_⟩ choose! U hxU hUl using fun x hx => (nhds_basis_opens x).disjoint_iff_left.1 (H x hx) choose hxU hUo using hxU rcases hs.elim_nhds_subcover U fun x hx => (hUo x hx).mem_nhds (hxU x hx) with ⟨t, hts, hst⟩ refine (hasBasis_nhdsSet _).disjoint_iff_left.2 ⟨⋃ x ∈ t, U x, ⟨isOpen_biUnion fun x hx => hUo x (hts x hx), hst⟩, ?_⟩ rw [compl_iUnion₂, biInter_finset_mem] exact fun x hx => hUl x (hts x hx) /-- A filter `l` is disjoint with the neighborhood filter of a compact set if and only if it is disjoint with the neighborhood filter of each point of this set. -/ theorem IsCompact.disjoint_nhdsSet_right {l : Filter X} (hs : IsCompact s) : Disjoint l (𝓝ˢ s) ↔ ∀ x ∈ s, Disjoint l (𝓝 x) := by simpa only [disjoint_comm] using hs.disjoint_nhdsSet_left -- TODO: reformulate using `Disjoint` /-- For every directed family of closed sets whose intersection avoids a compact set, there exists a single element of the family which itself avoids this compact set. -/ theorem IsCompact.elim_directed_family_closed {ι : Type v} [Nonempty ι] (hs : IsCompact s) (t : ι → Set X) (htc : ∀ i, IsClosed (t i)) (hst : (s ∩ ⋂ i, t i) = ∅) (hdt : Directed (· ⊇ ·) t) : ∃ i : ι, s ∩ t i = ∅ := let ⟨t, ht⟩ := hs.elim_directed_cover (compl ∘ t) (fun i => (htc i).isOpen_compl) (by simpa only [subset_def, not_forall, eq_empty_iff_forall_not_mem, mem_iUnion, exists_prop, mem_inter_iff, not_and, mem_iInter, mem_compl_iff] using hst) (hdt.mono_comp _ fun _ _ => compl_subset_compl.mpr) ⟨t, by simpa only [subset_def, not_forall, eq_empty_iff_forall_not_mem, mem_iUnion, exists_prop, mem_inter_iff, not_and, mem_iInter, mem_compl_iff] using ht⟩ -- TODO: reformulate using `Disjoint` /-- For every family of closed sets whose intersection avoids a compact set, there exists a finite subfamily whose intersection avoids this compact set. -/ theorem IsCompact.elim_finite_subfamily_closed {ι : Type v} (hs : IsCompact s) (t : ι → Set X) (htc : ∀ i, IsClosed (t i)) (hst : (s ∩ ⋂ i, t i) = ∅) : ∃ u : Finset ι, (s ∩ ⋂ i ∈ u, t i) = ∅ := hs.elim_directed_family_closed _ (fun _ ↦ isClosed_biInter fun _ _ ↦ htc _) (by rwa [← iInter_eq_iInter_finset]) (directed_of_isDirected_le fun _ _ h ↦ biInter_subset_biInter_left h) /-- To show that a compact set intersects the intersection of a family of closed sets, it is sufficient to show that it intersects every finite subfamily. -/ theorem IsCompact.inter_iInter_nonempty {ι : Type v} (hs : IsCompact s) (t : ι → Set X) (htc : ∀ i, IsClosed (t i)) (hst : ∀ u : Finset ι, (s ∩ ⋂ i ∈ u, t i).Nonempty) : (s ∩ ⋂ i, t i).Nonempty := by contrapose! hst exact hs.elim_finite_subfamily_closed t htc hst /-- Cantor's intersection theorem for `iInter`: the intersection of a directed family of nonempty compact closed sets is nonempty. -/ theorem IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed {ι : Type v} [hι : Nonempty ι] (t : ι → Set X) (htd : Directed (· ⊇ ·) t) (htn : ∀ i, (t i).Nonempty) (htc : ∀ i, IsCompact (t i)) (htcl : ∀ i, IsClosed (t i)) : (⋂ i, t i).Nonempty := by let i₀ := hι.some suffices (t i₀ ∩ ⋂ i, t i).Nonempty by rwa [inter_eq_right.mpr (iInter_subset _ i₀)] at this simp only [nonempty_iff_ne_empty] at htn ⊢ apply mt ((htc i₀).elim_directed_family_closed t htcl) push_neg simp only [← nonempty_iff_ne_empty] at htn ⊢ refine ⟨htd, fun i => ?_⟩ rcases htd i₀ i with ⟨j, hji₀, hji⟩ exact (htn j).mono (subset_inter hji₀ hji) /-- Cantor's intersection theorem for `sInter`: the intersection of a directed family of nonempty compact closed sets is nonempty. -/ theorem IsCompact.nonempty_sInter_of_directed_nonempty_isCompact_isClosed {S : Set (Set X)} [hS : Nonempty S] (hSd : DirectedOn (· ⊇ ·) S) (hSn : ∀ U ∈ S, U.Nonempty) (hSc : ∀ U ∈ S, IsCompact U) (hScl : ∀ U ∈ S, IsClosed U) : (⋂₀ S).Nonempty := by rw [sInter_eq_iInter] exact IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed _ (DirectedOn.directed_val hSd) (fun i ↦ hSn i i.2) (fun i ↦ hSc i i.2) (fun i ↦ hScl i i.2) /-- Cantor's intersection theorem for sequences indexed by `ℕ`: the intersection of a decreasing sequence of nonempty compact closed sets is nonempty. -/ theorem IsCompact.nonempty_iInter_of_sequence_nonempty_isCompact_isClosed (t : ℕ → Set X) (htd : ∀ i, t (i + 1) ⊆ t i) (htn : ∀ i, (t i).Nonempty) (ht0 : IsCompact (t 0)) (htcl : ∀ i, IsClosed (t i)) : (⋂ i, t i).Nonempty := have tmono : Antitone t := antitone_nat_of_succ_le htd have htd : Directed (· ⊇ ·) t := tmono.directed_ge have : ∀ i, t i ⊆ t 0 := fun i => tmono <\| Nat.zero_le i have htc : ∀ i, IsCompact (t i) := fun i => ht0.of_isClosed_subset (htcl i) (this i) IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed t htd htn htc htcl /-- For every open cover of a compact set, there exists a finite subcover. -/ theorem IsCompact.elim_finite_subcover_image {b : Set ι} {c : ι → Set X} (hs : IsCompact s) (hc₁ : ∀ i ∈ b, IsOpen (c i)) (hc₂ : s ⊆ ⋃ i ∈ b, c i) : ∃ b', b' ⊆ b ∧ Set.Finite b' ∧ s ⊆ ⋃ i ∈ b', c i := by simp only [Subtype.forall', biUnion_eq_iUnion] at hc₁ hc₂ rcases hs.elim_finite_subcover (fun i => c i : b → Set X) hc₁ hc₂ with ⟨d, hd⟩ refine ⟨Subtype.val '' d.toSet, ?_, d.finite_toSet.image _, ?_⟩ · simp · rwa [biUnion_image] /-- A set `s` is compact if for every open cover of `s`, there exists a finite subcover. -/ theorem isCompact_of_finite_subcover (h : ∀ {ι : Type u} (U : ι → Set X), (∀ i, IsOpen (U i)) → (s ⊆ ⋃ i, U i) → ∃ t : Finset ι, s ⊆ ⋃ i ∈ t, U i) : IsCompact s := fun f hf hfs => by contrapose! h simp only [ClusterPt, not_neBot, ← disjoint_iff, SetCoe.forall', (nhds_basis_opens _).disjoint_iff_left] at h choose U hU hUf using h refine ⟨s, U, fun x => (hU x).2, fun x hx => mem_iUnion.2 ⟨⟨x, hx⟩, (hU _).1⟩, fun t ht => ?_⟩ refine compl_not_mem (le_principal_iff.1 hfs) ?_ refine mem_of_superset ((biInter_finset_mem t).2 fun x _ => hUf x) ?_ rw [subset_compl_comm, compl_iInter₂] simpa only [compl_compl] -- TODO: reformulate using `Disjoint` /-- A set `s` is compact if for every family of closed sets whose intersection avoids `s`, there exists a finite subfamily whose intersection avoids `s`. -/ theorem isCompact_of_finite_subfamily_closed (h : ∀ {ι : Type u} (t : ι → Set X), (∀ i, IsClosed (t i)) → (s ∩ ⋂ i, t i) = ∅ → ∃ u : Finset ι, (s ∩ ⋂ i ∈ u, t i) = ∅) : IsCompact s := isCompact_of_finite_subcover fun U hUo hsU => by rw [← disjoint_compl_right_iff_subset, compl_iUnion, disjoint_iff] at hsU rcases h (fun i => (U i)ᶜ) (fun i => (hUo _).isClosed_compl) hsU with ⟨t, ht⟩ refine ⟨t, ?_⟩ rwa [← disjoint_compl_right_iff_subset, compl_iUnion₂, disjoint_iff] /-- A set `s` is compact if and only if for every open cover of `s`, there exists a finite subcover. -/ theorem isCompact_iff_finite_subcover : IsCompact s ↔ ∀ {ι : Type u} (U : ι → Set X), (∀ i, IsOpen (U i)) → (s ⊆ ⋃ i, U i) → ∃ t : Finset ι, s ⊆ ⋃ i ∈ t, U i := ⟨fun hs => hs.elim_finite_subcover, isCompact_of_finite_subcover⟩ /-- A set `s` is compact if and only if for every family of closed sets whose intersection avoids `s`, there exists a finite subfamily whose intersection avoids `s`. -/ theorem isCompact_iff_finite_subfamily_closed : IsCompact s ↔ ∀ {ι : Type u} (t : ι → Set X), (∀ i, IsClosed (t i)) → (s ∩ ⋂ i, t i) = ∅ → ∃ u : Finset ι, (s ∩ ⋂ i ∈ u, t i) = ∅ := ⟨fun hs => hs.elim_finite_subfamily_closed, isCompact_of_finite_subfamily_closed⟩ /-- If `s : Set (X × Y)` belongs to `𝓝 x ×ˢ l` for all `x` from a compact set `K`, then it belongs to `(𝓝ˢ K) ×ˢ l`, i.e., there exist an open `U ⊇ K` and `t ∈ l` such that `U ×ˢ t ⊆ s`. -/ theorem IsCompact.mem_nhdsSet_prod_of_forall {K : Set X} {Y} {l : Filter Y} {s : Set (X × Y)} (hK : IsCompact K) (hs : ∀ x ∈ K, s ∈ 𝓝 x ×ˢ l) : s ∈ (𝓝ˢ K) ×ˢ l := by refine hK.induction_on (by simp) (fun t t' ht hs ↦ ?_) (fun t t' ht ht' ↦ ?_) fun x hx ↦ ?_ · exact prod_mono (nhdsSet_mono ht) le_rfl hs · simp [sup_prod, ] · rcases ((nhds_basis_opens _).prod l.basis_sets).mem_iff.1 (hs x hx) with ⟨⟨u, v⟩, ⟨⟨hx, huo⟩, hv⟩, hs⟩ refine ⟨u, nhdsWithin_le_nhds (huo.mem_nhds hx), mem_of_superset ?_ hs⟩ exact prod_mem_prod (huo.mem_nhdsSet.2 Subset.rfl) hv theorem IsCompact.nhdsSet_prod_eq_biSup {K : Set X} (hK : IsCompact K) {Y} (l : Filter Y) : (𝓝ˢ K) ×ˢ l = ⨆ x ∈ K, 𝓝 x ×ˢ l := le_antisymm (fun s hs ↦ hK.mem_nhdsSet_prod_of_forall <\| by simpa using hs) (iSup₂_le fun _ hx ↦ prod_mono (nhds_le_nhdsSet hx) le_rfl) theorem IsCompact.prod_nhdsSet_eq_biSup {K : Set Y} (hK : IsCompact K) {X} (l : Filter X) : l ×ˢ (𝓝ˢ K) = ⨆ y ∈ K, l ×ˢ 𝓝 y := by simp only [prod_comm (f := l), hK.nhdsSet_prod_eq_biSup, map_iSup] /-- If `s : Set (X × Y)` belongs to `l ×ˢ 𝓝 y` for all `y` from a compact set `K`, then it belongs to `l ×ˢ (𝓝ˢ K)`, i.e., there exist `t ∈ l` and an open `U ⊇ K` such that `t ×ˢ U ⊆ s`. -/ theorem IsCompact.mem_prod_nhdsSet_of_forall {K : Set Y} {X} {l : Filter X} {s : Set (X × Y)} (hK : IsCompact K) (hs : ∀ y ∈ K, s ∈ l ×ˢ 𝓝 y) : s ∈ l ×ˢ 𝓝ˢ K := (hK.prod_nhdsSet_eq_biSup l).symm ▸ by simpa using hs -- TODO: Is there a way to prove directly the `inf` version and then deduce the `Prod` one ? -- That would seem a bit more natural. theorem IsCompact.nhdsSet_inf_eq_biSup {K : Set X} (hK : IsCompact K) (l : Filter X) : (𝓝ˢ K) ⊓ l = ⨆ x ∈ K, 𝓝 x ⊓ l := by have : ∀ f : Filter X, f ⊓ l = comap (fun x ↦ (x, x)) (f ×ˢ l) := fun f ↦ by simpa only [comap_prod] using congrArg₂ (· ⊓ ·) comap_id.symm comap_id.symm simp_rw [this, ← comap_iSup, hK.nhdsSet_prod_eq_biSup] theorem IsCompact.inf_nhdsSet_eq_biSup {K : Set X} (hK : IsCompact K) (l : Filter X) : l ⊓ (𝓝ˢ K) = ⨆ x ∈ K, l ⊓ 𝓝 x := by simp only [inf_comm l, hK.nhdsSet_inf_eq_biSup] /-- If `s : Set X` belongs to `𝓝 x ⊓ l` for all `x` from a compact set `K`, then it belongs to `(𝓝ˢ K) ⊓ l`, i.e., there exist an open `U ⊇ K` and `T ∈ l` such that `U ∩ T ⊆ s`. -/ theorem IsCompact.mem_nhdsSet_inf_of_forall {K : Set X} {l : Filter X} {s : Set X} (hK : IsCompact K) (hs : ∀ x ∈ K, s ∈ 𝓝 x ⊓ l) : s ∈ (𝓝ˢ K) ⊓ l := (hK.nhdsSet_inf_eq_biSup l).symm ▸ by simpa using hs /-- If `s : Set S` belongs to `l ⊓ 𝓝 x` for all `x` from a compact set `K`, then it belongs to `l ⊓ (𝓝ˢ K)`, i.e., there exist `T ∈ l` and an open `U ⊇ K` such that `T ∩ U ⊆ s`. -/ theorem IsCompact.mem_inf_nhdsSet_of_forall {K : Set X} {l : Filter X} {s : Set X} (hK : IsCompact K) (hs : ∀ y ∈ K, s ∈ l ⊓ 𝓝 y) : s ∈ l ⊓ 𝓝ˢ K := (hK.inf_nhdsSet_eq_biSup l).symm ▸ by simpa using hs /-- To show that `∀ y ∈ K, P x y` holds for `x` close enough to `x₀` when `K` is compact, it is sufficient to show that for all `y₀ ∈ K` there `P x y` holds for `(x, y)` close enough to `(x₀, y₀)`. Provided for backwards compatibility, see `IsCompact.mem_prod_nhdsSet_of_forall` for a stronger statement. -/ theorem IsCompact.eventually_forall_of_forall_eventually {x₀ : X} {K : Set Y} (hK : IsCompact K) {P : X → Y → Prop} (hP : ∀ y ∈ K, ∀ᶠ z : X × Y in 𝓝 (x₀, y), P z.1 z.2) : ∀ᶠ x in 𝓝 x₀, ∀ y ∈ K, P x y := by simp only [nhds_prod_eq, ← eventually_iSup, ← hK.prod_nhdsSet_eq_biSup] at hP exact hP.curry.mono fun _ h ↦ h.self_of_nhdsSet theorem isCompact_empty : IsCompact (∅ : Set X) := fun _f hnf hsf => Not.elim hnf.ne <\| empty_mem_iff_bot.1 <\| le_principal_iff.1 hsf theorem isCompact_singleton {x : X} : IsCompact ({x} : Set X) := fun _ hf hfa => ⟨x, rfl, ClusterPt.of_le_nhds' (hfa.trans <\| by simpa only [principal_singleton] using pure_le_nhds x) hf⟩ theorem Set.Subsingleton.isCompact (hs : s.Subsingleton) : IsCompact s := Subsingleton.induction_on hs isCompact_empty fun _ => isCompact_singleton theorem Set.Finite.isCompact_biUnion {s : Set ι} {f : ι → Set X} (hs : s.Finite) (hf : ∀ i ∈ s, IsCompact (f i)) : IsCompact (⋃ i ∈ s, f i) := isCompact_iff_ultrafilter_le_nhds'.2 fun l hl => by rw [Ultrafilter.finite_biUnion_mem_iff hs] at hl rcases hl with ⟨i, his, hi⟩ rcases (hf i his).ultrafilter_le_nhds _ (le_principal_iff.2 hi) with ⟨x, hxi, hlx⟩ exact ⟨x, mem_iUnion₂.2 ⟨i, his, hxi⟩, hlx⟩ theorem Finset.isCompact_biUnion (s : Finset ι) {f : ι → Set X} (hf : ∀ i ∈ s, IsCompact (f i)) : IsCompact (⋃ i ∈ s, f i) := s.finite_toSet.isCompact_biUnion hf theorem isCompact_accumulate {K : ℕ → Set X} (hK : ∀ n, IsCompact (K n)) (n : ℕ) : IsCompact (Accumulate K n) := (finite_le_nat n).isCompact_biUnion fun k _ => hK k theorem Set.Finite.isCompact_sUnion {S : Set (Set X)} (hf : S.Finite) (hc : ∀ s ∈ S, IsCompact s) : IsCompact (⋃₀ S) := by rw [sUnion_eq_biUnion]; exact hf.isCompact_biUnion hc theorem isCompact_iUnion {ι : Sort} {f : ι → Set X} [Finite ι] (h : ∀ i, IsCompact (f i)) : IsCompact (⋃ i, f i) := (finite_range f).isCompact_sUnion <\| forall_mem_range.2 h @[simp] theorem Set.Finite.isCompact (hs : s.Finite) : IsCompact s := biUnion_of_singleton s ▸ hs.isCompact_biUnion fun _ _ => isCompact_singleton theorem IsCompact.finite_of_discrete [DiscreteTopology X] (hs : IsCompact s) : s.Finite := by have : ∀ x : X, ({x} : Set X) ∈ 𝓝 x := by simp [nhds_discrete] rcases hs.elim_nhds_subcover (fun x => {x}) fun x _ => this x with ⟨t, _, hst⟩ simp only [← t.set_biUnion_coe, biUnion_of_singleton] at hst exact t.finite_toSet.subset hst theorem isCompact_iff_finite [DiscreteTopology X] : IsCompact s ↔ s.Finite := ⟨fun h => h.finite_of_discrete, fun h => h.isCompact⟩ theorem IsCompact.union (hs : IsCompact s) (ht : IsCompact t) : IsCompact (s ∪ t) := by rw [union_eq_iUnion]; exact isCompact_iUnion fun b => by cases b <;> assumption protected theorem IsCompact.insert (hs : IsCompact s) (a) : IsCompact (insert a s) := isCompact_singleton.union hs -- TODO: reformulate using `𝓝ˢ` /-- If `V : ι → Set X` is a decreasing family of closed compact sets then any neighborhood of `⋂ i, V i` contains some `V i`. We assume each `V i` is compact and closed because `X` is not assumed to be Hausdorff. See `exists_subset_nhd_of_compact` for version assuming this. -/ theorem exists_subset_nhds_of_isCompact' [Nonempty ι] {V : ι → Set X} (hV : Directed (· ⊇ ·) V) (hV_cpct : ∀ i, IsCompact (V i)) (hV_closed : ∀ i, IsClosed (V i)) {U : Set X} (hU : ∀ x ∈ ⋂ i, V i, U ∈ 𝓝 x) : ∃ i, V i ⊆ U := by obtain ⟨W, hsubW, W_op, hWU⟩ := exists_open_set_nhds hU suffices ∃ i, V i ⊆ W from this.imp fun i hi => hi.trans hWU by_contra! H replace H : ∀ i, (V i ∩ Wᶜ).Nonempty := fun i => Set.inter_compl_nonempty_iff.mpr (H i) have : (⋂ i, V i ∩ Wᶜ).Nonempty := by refine IsCompact.nonempty_iInter_of_directed_nonempty_isCompact_isClosed _ (fun i j => ?_) H (fun i => (hV_cpct i).inter_right W_op.isClosed_compl) fun i => (hV_closed i).inter W_op.isClosed_compl rcases hV i j with ⟨k, hki, hkj⟩ refine ⟨k, ⟨fun x => ?_, fun x => ?_⟩⟩ <;> simp only [and_imp, mem_inter_iff, mem_compl_iff] <;> tauto have : ¬⋂ i : ι, V i ⊆ W := by simpa [← iInter_inter, inter_compl_nonempty_iff] contradiction namespace Filter theorem hasBasis_cocompact : (cocompact X).HasBasis IsCompact compl := hasBasis_biInf_principal' (fun s hs t ht => ⟨s ∪ t, hs.union ht, compl_subset_compl.2 subset_union_left, compl_subset_compl.2 subset_union_right⟩) ⟨∅, isCompact_empty⟩ theorem mem_cocompact : s ∈ cocompact X ↔ ∃ t, IsCompact t ∧ tᶜ ⊆ s := hasBasis_cocompact.mem_iff theorem mem_cocompact' : s ∈ cocompact X ↔ ∃ t, IsCompact t ∧ sᶜ ⊆ t := mem_cocompact.trans <\| exists_congr fun _ => and_congr_right fun _ => compl_subset_comm theorem _root_.IsCompact.compl_mem_cocompact (hs : IsCompact s) : sᶜ ∈ Filter.cocompact X := hasBasis_cocompact.mem_of_mem hs theorem cocompact_le_cofinite : cocompact X ≤ cofinite := fun s hs => compl_compl s ▸ hs.isCompact.compl_mem_cocompact theorem cocompact_eq_cofinite (X : Type) [TopologicalSpace X] [DiscreteTopology X] : cocompact X = cofinite := by simp only [cocompact, hasBasis_cofinite.eq_biInf, isCompact_iff_finite] /-- A filter is disjoint from the cocompact filter if and only if it contains a compact set. -/ theorem disjoint_cocompact_left (f : Filter X) : Disjoint (Filter.cocompact X) f ↔ ∃ K ∈ f, IsCompact K := by simp_rw [hasBasis_cocompact.disjoint_iff_left, compl_compl] tauto /-- A filter is disjoint from the cocompact filter if and only if it contains a compact set. -/ theorem disjoint_cocompact_right (f : Filter X) : Disjoint f (Filter.cocompact X) ↔ ∃ K ∈ f, IsCompact K := by simp_rw [hasBasis_cocompact.disjoint_iff_right, compl_compl] tauto theorem Tendsto.isCompact_insert_range_of_cocompact {f : X → Y} {y} (hf : Tendsto f (cocompact X) (𝓝 y)) (hfc : Continuous f) : IsCompact (insert y (range f)) := by intro l hne hle by_cases hy : ClusterPt y l · exact ⟨y, Or.inl rfl, hy⟩ simp only [clusterPt_iff_nonempty, not_forall, ← not_disjoint_iff_nonempty_inter, not_not] at hy rcases hy with ⟨s, hsy, t, htl, hd⟩ rcases mem_cocompact.1 (hf hsy) with ⟨K, hKc, hKs⟩ have : f '' K ∈ l := by filter_upwards [htl, le_principal_iff.1 hle] with y hyt hyf rcases hyf with (rfl \| ⟨x, rfl⟩) exacts [(hd.le_bot ⟨mem_of_mem_nhds hsy, hyt⟩).elim, mem_image_of_mem _ (not_not.1 fun hxK => hd.le_bot ⟨hKs hxK, hyt⟩)] rcases hKc.image hfc (le_principal_iff.2 this) with ⟨y, hy, hyl⟩ exact ⟨y, Or.inr <\| image_subset_range _ _ hy, hyl⟩ theorem Tendsto.isCompact_insert_range_of_cofinite {f : ι → X} {x} (hf : Tendsto f cofinite (𝓝 x)) : IsCompact (insert x (range f)) := by letI : TopologicalSpace ι := ⊥; haveI h : DiscreteTopology ι := ⟨rfl⟩ rw [← cocompact_eq_cofinite ι] at hf exact hf.isCompact_insert_range_of_cocompact continuous_of_discreteTopology theorem Tendsto.isCompact_insert_range {f : ℕ → X} {x} (hf : Tendsto f atTop (𝓝 x)) : IsCompact (insert x (range f)) := Filter.Tendsto.isCompact_insert_range_of_cofinite <\| Nat.cofinite_eq_atTop.symm ▸ hf theorem hasBasis_coclosedCompact : (Filter.coclosedCompact X).HasBasis (fun s => IsClosed s ∧ IsCompact s) compl := by simp only [Filter.coclosedCompact, iInf_and'] refine hasBasis_biInf_principal' ?_ ⟨∅, isClosed_empty, isCompact_empty⟩ rintro s ⟨hs₁, hs₂⟩ t ⟨ht₁, ht₂⟩ exact ⟨s ∪ t, ⟨⟨hs₁.union ht₁, hs₂.union ht₂⟩, compl_subset_compl.2 subset_union_left, compl_subset_compl.2 subset_union_right⟩⟩ /-- A set belongs to `coclosedCompact` if and only if the closure of its complement is compact. -/ theorem mem_coclosedCompact_iff : s ∈ coclosedCompact X ↔ IsCompact (closure sᶜ) := by refine hasBasis_coclosedCompact.mem_iff.trans ⟨?_, fun h ↦ ?_⟩ · rintro ⟨t, ⟨htcl, htco⟩, hst⟩ exact htco.of_isClosed_subset isClosed_closure <\| closure_minimal (compl_subset_comm.2 hst) htcl · exact ⟨closure sᶜ, ⟨isClosed_closure, h⟩, compl_subset_comm.2 subset_closure⟩ /-- Complement of a set belongs to `coclosedCompact` if and only if its closure is compact. -/ theorem compl_mem_coclosedCompact : sᶜ ∈ coclosedCompact X ↔ IsCompact (closure s) := by rw [mem_coclosedCompact_iff, compl_compl] theorem cocompact_le_coclosedCompact : cocompact X ≤ coclosedCompact X := iInf_mono fun _ => le_iInf fun _ => le_rfl end Filter theorem IsCompact.compl_mem_coclosedCompact_of_isClosed (hs : IsCompact s) (hs' : IsClosed s) : sᶜ ∈ Filter.coclosedCompact X := hasBasis_coclosedCompact.mem_of_mem ⟨hs', hs⟩ namespace Bornology variable (X) in /-- Sets that are contained in a compact set form a bornology. Its `cobounded` filter is `Filter.cocompact`. See also `Bornology.relativelyCompact` the bornology of sets with compact closure. -/ def inCompact : Bornology X where cobounded' := Filter.cocompact X le_cofinite' := Filter.cocompact_le_cofinite theorem inCompact.isBounded_iff : @IsBounded _ (inCompact X) s ↔ ∃ t, IsCompact t ∧ s ⊆ t := by change sᶜ ∈ Filter.cocompact X ↔ _ rw [Filter.mem_cocompact] simp end Bornology /-- If `s` and `t` are compact sets, then the set neighborhoods filter of `s ×ˢ t` is the product of set neighborhoods filters for `s` and `t`. For general sets, only the `≤` inequality holds, see `nhdsSet_prod_le`. -/ theorem IsCompact.nhdsSet_prod_eq {t : Set Y} (hs : IsCompact s) (ht : IsCompact t) : 𝓝ˢ (s ×ˢ t) = 𝓝ˢ s ×ˢ 𝓝ˢ t := by simp_rw [hs.nhdsSet_prod_eq_biSup, ht.prod_nhdsSet_eq_biSup, nhdsSet, sSup_image, biSup_prod, nhds_prod_eq] theorem nhdsSet_prod_le_of_disjoint_cocompact {f : Filter Y} (hs : IsCompact s) (hf : Disjoint f (Filter.cocompact Y)) : 𝓝ˢ s ×ˢ f ≤ 𝓝ˢ (s ×ˢ Set.univ) := by obtain ⟨K, hKf, hK⟩ := (disjoint_cocompact_right f).mp hf calc 𝓝ˢ s ×ˢ f _ ≤ 𝓝ˢ s ×ˢ 𝓟 K := Filter.prod_mono_right _ (Filter.le_principal_iff.mpr hKf) _ ≤ 𝓝ˢ s ×ˢ 𝓝ˢ K := Filter.prod_mono_right _ principal_le_nhdsSet _ = 𝓝ˢ (s ×ˢ K) := (hs.nhdsSet_prod_eq hK).symm _ ≤ 𝓝ˢ (s ×ˢ Set.univ) := nhdsSet_mono (prod_mono_right le_top) theorem prod_nhdsSet_le_of_disjoint_cocompact {t : Set Y} {f : Filter X} (ht : IsCompact t) (hf : Disjoint f (Filter.cocompact X)) : f ×ˢ 𝓝ˢ t ≤ 𝓝ˢ (Set.univ ×ˢ t) := by obtain ⟨K, hKf, hK⟩ := (disjoint_cocompact_right f).mp hf calc f ×ˢ 𝓝ˢ t _ ≤ (𝓟 K) ×ˢ 𝓝ˢ t := Filter.prod_mono_left _ (Filter.le_principal_iff.mpr hKf) _ ≤ 𝓝ˢ K ×ˢ 𝓝ˢ t := Filter.prod_mono_left _ principal_le_nhdsSet _ = 𝓝ˢ (K ×ˢ t) := (hK.nhdsSet_prod_eq ht).symm _ ≤ 𝓝ˢ (Set.univ ×ˢ t) := nhdsSet_mono (prod_mono_left le_top) theorem nhds_prod_le_of_disjoint_cocompact {f : Filter Y} (x : X) (hf : Disjoint f (Filter.cocompact Y)) : 𝓝 x ×ˢ f ≤ 𝓝ˢ ({x} ×ˢ Set.univ) := by simpa using nhdsSet_prod_le_of_disjoint_cocompact isCompact_singleton hf theorem prod_nhds_le_of_disjoint_cocompact {f : Filter X} (y : Y) (hf : Disjoint f (Filter.cocompact X)) : f ×ˢ 𝓝 y ≤ 𝓝ˢ (Set.univ ×ˢ {y}) := by simpa using prod_nhdsSet_le_of_disjoint_cocompact isCompact_singleton hf /-- If `s` and `t` are compact sets and `n` is an open neighborhood of `s × t`, then there exist open neighborhoods `u ⊇ s` and `v ⊇ t` such that `u × v ⊆ n`. See also `IsCompact.nhdsSet_prod_eq`. -/ theorem generalized_tube_lemma (hs : IsCompact s) {t : Set Y} (ht : IsCompact t) {n : Set (X × Y)} (hn : IsOpen n) (hp : s ×ˢ t ⊆ n) : ∃ (u : Set X) (v : Set Y), IsOpen u ∧ IsOpen v ∧ s ⊆ u ∧ t ⊆ v ∧ u ×ˢ v ⊆ n := by rw [← hn.mem_nhdsSet, hs.nhdsSet_prod_eq ht, ((hasBasis_nhdsSet _).prod (hasBasis_nhdsSet _)).mem_iff] at hp rcases hp with ⟨⟨u, v⟩, ⟨⟨huo, hsu⟩, hvo, htv⟩, hn⟩ exact ⟨u, v, huo, hvo, hsu, htv, hn⟩ -- see Note [lower instance priority] instance (priority := 10) Subsingleton.compactSpace [Subsingleton X] : CompactSpace X := ⟨subsingleton_univ.isCompact⟩ theorem isCompact_univ_iff : IsCompact (univ : Set X) ↔ CompactSpace X := ⟨fun h => ⟨h⟩, fun h => h.1⟩ theorem isCompact_univ [h : CompactSpace X] : IsCompact (univ : Set X) := h.isCompact_univ theorem exists_clusterPt_of_compactSpace [CompactSpace X] (f : Filter X) [NeBot f] : ∃ x, ClusterPt x f := by simpa using isCompact_univ (show f ≤ 𝓟 univ by simp) nonrec theorem Ultrafilter.le_nhds_lim [CompactSpace X] (F : Ultrafilter X) : ↑F ≤ 𝓝 F.lim := by rcases isCompact_univ.ultrafilter_le_nhds F (by simp) with ⟨x, -, h⟩ exact le_nhds_lim ⟨x, h⟩ theorem CompactSpace.elim_nhds_subcover [CompactSpace X] (U : X → Set X) (hU : ∀ x, U x ∈ 𝓝 x) : ∃ t : Finset X, ⋃ x ∈ t, U x = ⊤ := by obtain ⟨t, -, s⟩ := IsCompact.elim_nhds_subcover isCompact_univ U fun x _ => hU x exact ⟨t, top_unique s⟩ theorem compactSpace_of_finite_subfamily_closed (h : ∀ {ι : Type u} (t : ι → Set X), (∀ i, IsClosed (t i)) → ⋂ i, t i = ∅ → ∃ u : Finset ι, ⋂ i ∈ u, t i = ∅) : CompactSpace X where isCompact_univ := isCompact_of_finite_subfamily_closed fun t => by simpa using h t theorem IsClosed.isCompact [CompactSpace X] (h : IsClosed s) : IsCompact s := isCompact_univ.of_isClosed_subset h (subset_univ _) /-- If a filter has a unique cluster point `y` in a compact topological space, then the filter is less than or equal to `𝓝 y`. -/ lemma le_nhds_of_unique_clusterPt [CompactSpace X] {l : Filter X} {y : X} (h : ∀ x, ClusterPt x l → x = y) : l ≤ 𝓝 y := isCompact_univ.le_nhds_of_unique_clusterPt univ_mem fun x _ ↦ h x /-- If `y` is a unique `MapClusterPt` for `f` along `l` and the codomain of `f` is a compact space, then `f` tends to `𝓝 y` along `l`. -/ lemma tendsto_nhds_of_unique_mapClusterPt [CompactSpace X] {Y} {l : Filter Y} {y : X} {f : Y → X} (h : ∀ x, MapClusterPt x l f → x = y) : Tendsto f l (𝓝 y) := le_nhds_of_unique_clusterPt h lemma noncompact_univ (X : Type) [TopologicalSpace X] [NoncompactSpace X] : ¬IsCompact (univ : Set X) := NoncompactSpace.noncompact_univ theorem IsCompact.ne_univ [NoncompactSpace X] (hs : IsCompact s) : s ≠ univ := fun h => noncompact_univ X (h ▸ hs) instance [NoncompactSpace X] : NeBot (Filter.cocompact X) := by refine Filter.hasBasis_cocompact.neBot_iff.2 fun hs => ?_ contrapose hs; rw [not_nonempty_iff_eq_empty, compl_empty_iff] at hs rw [hs]; exact noncompact_univ X @[simp] theorem Filter.cocompact_eq_bot [CompactSpace X] : Filter.cocompact X = ⊥ := Filter.hasBasis_cocompact.eq_bot_iff.mpr ⟨Set.univ, isCompact_univ, Set.compl_univ⟩ instance [NoncompactSpace X] : NeBot (Filter.coclosedCompact X) := neBot_of_le Filter.cocompact_le_coclosedCompact theorem noncompactSpace_of_neBot (_ : NeBot (Filter.cocompact X)) : NoncompactSpace X := ⟨fun h' => (Filter.nonempty_of_mem h'.compl_mem_cocompact).ne_empty compl_univ⟩ theorem Filter.cocompact_neBot_iff : NeBot (Filter.cocompact X) ↔ NoncompactSpace X := ⟨noncompactSpace_of_neBot, fun _ => inferInstance⟩ theorem not_compactSpace_iff : ¬CompactSpace X ↔ NoncompactSpace X := ⟨fun h₁ => ⟨fun h₂ => h₁ ⟨h₂⟩⟩, fun ⟨h₁⟩ ⟨h₂⟩ => h₁ h₂⟩ instance : NoncompactSpace ℤ := noncompactSpace_of_neBot <\| by simp only [Filter.cocompact_eq_cofinite, Filter.cofinite_neBot] -- Note: We can't make this into an instance because it loops with `Finite.compactSpace`. /-- A compact discrete space is finite. -/ theorem finite_of_compact_of_discrete [CompactSpace X] [DiscreteTopology X] : Finite X := Finite.of_finite_univ <\| isCompact_univ.finite_of_discrete lemma Set.Infinite.exists_accPt_cofinite_inf_principal_of_subset_isCompact {K : Set X} (hs : s.Infinite) (hK : IsCompact K) (hsub : s ⊆ K) : ∃ x ∈ K, AccPt x (cofinite ⊓ 𝓟 s) := (@hK _ hs.cofinite_inf_principal_neBot (inf_le_right.trans <\| principal_mono.2 hsub)).imp fun x hx ↦ by rwa [accPt_iff_clusterPt, inf_comm, inf_right_comm, (finite_singleton _).cofinite_inf_principal_compl] lemma Set.Infinite.exists_accPt_of_subset_isCompact {K : Set X} (hs : s.Infinite) (hK : IsCompact K) (hsub : s ⊆ K) : ∃ x ∈ K, AccPt x (𝓟 s) := let ⟨x, hxK, hx⟩ := hs.exists_accPt_cofinite_inf_principal_of_subset_isCompact hK hsub ⟨x, hxK, hx.mono inf_le_right⟩ lemma Set.Infinite.exists_accPt_cofinite_inf_principal [CompactSpace X] (hs : s.Infinite) : ∃ x, AccPt x (cofinite ⊓ 𝓟 s) := by simpa only [mem_univ, true_and] using hs.exists_accPt_cofinite_inf_principal_of_subset_isCompact isCompact_univ s.subset_univ lemma Set.Infinite.exists_accPt_principal [CompactSpace X] (hs : s.Infinite) : ∃ x, AccPt x (𝓟 s) := hs.exists_accPt_cofinite_inf_principal.imp fun _x hx ↦ hx.mono inf_le_right theorem exists_nhds_ne_neBot (X : Type*) [TopologicalSpace X] [CompactSpace X] [Infinite X] : ∃ z : X, (𝓝[≠] z).NeBot := by simpa [AccPt] using (@infinite_univ X _).exists_accPt_principal theorem finite_cover_nhds_interior [CompactSpace X] {U : X → Set X} (hU : ∀ x, U x ∈ 𝓝 x) : ∃ t : Finset X, ⋃ x ∈ t, interior (U x) = univ := let ⟨t, ht⟩ := isCompact_univ.elim_finite_subcover (fun x => interior (U x)) (fun _ => isOpen_interior) fun x _ => mem_iUnion.2 ⟨x, mem_interior_iff_mem_nhds.2 (hU x)⟩ ⟨t, univ_subset_iff.1 ht⟩	theorem finite_cover_nhds [CompactSpace X] {U : X → Set X} (hU : ∀ x, U x ∈ 𝓝 x) : ∃ t : Finset X, ⋃ x ∈ t, U x = univ := let ⟨t, ht⟩ := finite_cover_nhds_interior hU ⟨t, univ_subset_iff.1 <\| ht.symm.subset.trans <\| iUnion₂_mono fun _ _ => interior_subset⟩ /-- The comap of the cocompact filter on `Y` by a continuous function `f : X → Y` is less than or equal to the cocompact filter on `X`.	Mathlib/Topology/Compactness/Compact.lean	779	785
/- Copyright (c) 2020 Aaron Anderson, Jalex Stark. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Aaron Anderson, Jalex Stark -/ import Mathlib.Algebra.Polynomial.Expand import Mathlib.Algebra.Polynomial.Laurent import Mathlib.Algebra.Polynomial.Eval.SMul import Mathlib.LinearAlgebra.Matrix.Charpoly.Basic import Mathlib.LinearAlgebra.Matrix.Reindex import Mathlib.RingTheory.Polynomial.Nilpotent /-! # Characteristic polynomials We give methods for computing coefficients of the characteristic polynomial. ## Main definitions - `Matrix.charpoly_degree_eq_dim` proves that the degree of the characteristic polynomial over a nonzero ring is the dimension of the matrix - `Matrix.det_eq_sign_charpoly_coeff` proves that the determinant is the constant term of the characteristic polynomial, up to sign. - `Matrix.trace_eq_neg_charpoly_coeff` proves that the trace is the negative of the (d-1)th coefficient of the characteristic polynomial, where d is the dimension of the matrix. For a nonzero ring, this is the second-highest coefficient. - `Matrix.charpolyRev` the reverse of the characteristic polynomial. - `Matrix.reverse_charpoly` characterises the reverse of the characteristic polynomial. -/ noncomputable section universe u v w z open Finset Matrix Polynomial variable {R : Type u} [CommRing R] variable {n G : Type v} [DecidableEq n] [Fintype n] variable {α β : Type v} [DecidableEq α] variable {M : Matrix n n R} namespace Matrix theorem charmatrix_apply_natDegree [Nontrivial R] (i j : n) : (charmatrix M i j).natDegree = ite (i = j) 1 0 := by by_cases h : i = j <;> simp [h, ← degree_eq_iff_natDegree_eq_of_pos (Nat.succ_pos 0)] theorem charmatrix_apply_natDegree_le (i j : n) : (charmatrix M i j).natDegree ≤ ite (i = j) 1 0 := by split_ifs with h <;> simp [h, natDegree_X_le] variable (M) theorem charpoly_sub_diagonal_degree_lt : (M.charpoly - ∏ i : n, (X - C (M i i))).degree < ↑(Fintype.card n - 1) := by rw [charpoly, det_apply', ← insert_erase (mem_univ (Equiv.refl n)), sum_insert (not_mem_erase (Equiv.refl n) univ), add_comm] simp only [charmatrix_apply_eq, one_mul, Equiv.Perm.sign_refl, id, Int.cast_one, Units.val_one, add_sub_cancel_right, Equiv.coe_refl] rw [← mem_degreeLT] apply Submodule.sum_mem (degreeLT R (Fintype.card n - 1)) intro c hc; rw [← C_eq_intCast, C_mul'] apply Submodule.smul_mem (degreeLT R (Fintype.card n - 1)) ↑↑(Equiv.Perm.sign c) rw [mem_degreeLT] apply lt_of_le_of_lt degree_le_natDegree _ rw [Nat.cast_lt] apply lt_of_le_of_lt _ (Equiv.Perm.fixed_point_card_lt_of_ne_one (ne_of_mem_erase hc)) apply le_trans (Polynomial.natDegree_prod_le univ fun i : n => charmatrix M (c i) i) _ rw [card_eq_sum_ones]; rw [sum_filter]; apply sum_le_sum intros apply charmatrix_apply_natDegree_le theorem charpoly_coeff_eq_prod_coeff_of_le {k : ℕ} (h : Fintype.card n - 1 ≤ k) : M.charpoly.coeff k = (∏ i : n, (X - C (M i i))).coeff k := by apply eq_of_sub_eq_zero; rw [← coeff_sub] apply Polynomial.coeff_eq_zero_of_degree_lt apply lt_of_lt_of_le (charpoly_sub_diagonal_degree_lt M) ?_ rw [Nat.cast_le]; apply h theorem det_of_card_zero (h : Fintype.card n = 0) (M : Matrix n n R) : M.det = 1 := by rw [Fintype.card_eq_zero_iff] at h suffices M = 1 by simp [this] ext i exact h.elim i theorem charpoly_degree_eq_dim [Nontrivial R] (M : Matrix n n R) : M.charpoly.degree = Fintype.card n := by by_cases h : Fintype.card n = 0 · rw [h] unfold charpoly rw [det_of_card_zero] · simp · assumption rw [← sub_add_cancel M.charpoly (∏ i : n, (X - C (M i i)))] -- Porting note: added `↑` in front of `Fintype.card n` have h1 : (∏ i : n, (X - C (M i i))).degree = ↑(Fintype.card n) := by rw [degree_eq_iff_natDegree_eq_of_pos (Nat.pos_of_ne_zero h), natDegree_prod'] · simp_rw [natDegree_X_sub_C] rw [← Finset.card_univ, sum_const, smul_eq_mul, mul_one] simp_rw [(monic_X_sub_C _).leadingCoeff] simp rw [degree_add_eq_right_of_degree_lt] · exact h1 rw [h1] apply lt_trans (charpoly_sub_diagonal_degree_lt M) rw [Nat.cast_lt] rw [← Nat.pred_eq_sub_one] apply Nat.pred_lt apply h @[simp] theorem charpoly_natDegree_eq_dim [Nontrivial R] (M : Matrix n n R) : M.charpoly.natDegree = Fintype.card n := natDegree_eq_of_degree_eq_some (charpoly_degree_eq_dim M) theorem charpoly_monic (M : Matrix n n R) : M.charpoly.Monic := by nontriviality R by_cases h : Fintype.card n = 0 · rw [charpoly, det_of_card_zero h] apply monic_one have mon : (∏ i : n, (X - C (M i i))).Monic := by apply monic_prod_of_monic univ fun i : n => X - C (M i i) simp [monic_X_sub_C] rw [← sub_add_cancel (∏ i : n, (X - C (M i i))) M.charpoly] at mon rw [Monic] at * rwa [leadingCoeff_add_of_degree_lt] at mon rw [charpoly_degree_eq_dim] rw [← neg_sub] rw [degree_neg] apply lt_trans (charpoly_sub_diagonal_degree_lt M) rw [Nat.cast_lt] rw [← Nat.pred_eq_sub_one] apply Nat.pred_lt apply h /-- See also `Matrix.coeff_charpolyRev_eq_neg_trace`. -/ theorem trace_eq_neg_charpoly_coeff [Nonempty n] (M : Matrix n n R) : trace M = -M.charpoly.coeff (Fintype.card n - 1) := by rw [charpoly_coeff_eq_prod_coeff_of_le _ le_rfl, Fintype.card, prod_X_sub_C_coeff_card_pred univ (fun i : n => M i i) Fintype.card_pos, neg_neg, trace] simp_rw [diag_apply] theorem matPolyEquiv_symm_map_eval (M : (Matrix n n R)[X]) (r : R) : (matPolyEquiv.symm M).map (eval r) = M.eval (scalar n r) := by suffices ((aeval r).mapMatrix.comp matPolyEquiv.symm.toAlgHom : (Matrix n n R)[X] →ₐ[R] _) = (eval₂AlgHom' (AlgHom.id R _) (scalar n r) fun x => (scalar_commute _ (Commute.all _) _).symm) from DFunLike.congr_fun this M ext : 1 · ext M : 1 simp [Function.comp_def] · simp [smul_eq_diagonal_mul] theorem matPolyEquiv_eval_eq_map (M : Matrix n n R[X]) (r : R) : (matPolyEquiv M).eval (scalar n r) = M.map (eval r) := by simpa only [AlgEquiv.symm_apply_apply] using (matPolyEquiv_symm_map_eval (matPolyEquiv M) r).symm -- I feel like this should use `Polynomial.algHom_eval₂_algebraMap` theorem matPolyEquiv_eval (M : Matrix n n R[X]) (r : R) (i j : n) : (matPolyEquiv M).eval (scalar n r) i j = (M i j).eval r := by rw [matPolyEquiv_eval_eq_map, map_apply] theorem eval_det (M : Matrix n n R[X]) (r : R) : Polynomial.eval r M.det = (Polynomial.eval (scalar n r) (matPolyEquiv M)).det := by rw [Polynomial.eval, ← coe_eval₂RingHom, RingHom.map_det] apply congr_arg det ext symm exact matPolyEquiv_eval _ _ _ _ theorem det_eq_sign_charpoly_coeff (M : Matrix n n R) : M.det = (-1) ^ Fintype.card n * M.charpoly.coeff 0 := by rw [coeff_zero_eq_eval_zero, charpoly, eval_det, matPolyEquiv_charmatrix, ← det_smul] simp lemma eval_det_add_X_smul (A : Matrix n n R[X]) (M : Matrix n n R) : (det (A + (X : R[X]) • M.map C)).eval 0 = (det A).eval 0 := by simp only [eval_det, map_zero, map_add, eval_add, Algebra.smul_def, map_mul] simp only [Algebra.algebraMap_eq_smul_one, matPolyEquiv_smul_one, map_X, X_mul, eval_mul_X, mul_zero, add_zero] lemma derivative_det_one_add_X_smul_aux {n} (M : Matrix (Fin n) (Fin n) R) : (derivative <\| det (1 + (X : R[X]) • M.map C)).eval 0 = trace M := by induction n with \| zero => simp \| succ n IH => rw [det_succ_row_zero, map_sum, eval_finset_sum] simp only [add_apply, smul_apply, map_apply, smul_eq_mul, X_mul_C, submatrix_add, submatrix_smul, Pi.add_apply, Pi.smul_apply, submatrix_map, derivative_mul, map_add, derivative_C, zero_mul, derivative_X, mul_one, zero_add, eval_add, eval_mul, eval_C, eval_X, mul_zero, add_zero, eval_det_add_X_smul, eval_pow, eval_neg, eval_one]	rw [Finset.sum_eq_single 0] · simp only [Fin.val_zero, pow_zero, derivative_one, eval_zero, one_apply_eq, eval_one, mul_one, zero_add, one_mul, Fin.succAbove_zero, submatrix_one _ (Fin.succ_injective _), det_one, IH, trace_submatrix_succ] · intro i _ hi	Mathlib/LinearAlgebra/Matrix/Charpoly/Coeff.lean	193	197
/- Copyright (c) 2022 Oliver Nash. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Oliver Nash -/ import Mathlib.MeasureTheory.Integral.IntervalIntegral.Periodic import Mathlib.Data.ZMod.QuotientGroup import Mathlib.MeasureTheory.Group.AEStabilizer /-! # Measure-theoretic results about the additive circle The file is a place to collect measure-theoretic results about the additive circle. ## Main definitions: * `AddCircle.closedBall_ae_eq_ball`: open and closed balls in the additive circle are almost equal * `AddCircle.isAddFundamentalDomain_of_ae_ball`: a ball is a fundamental domain for rational angle rotation in the additive circle -/ open Set Function Filter MeasureTheory MeasureTheory.Measure Metric open scoped Finset MeasureTheory Pointwise Topology ENNReal namespace AddCircle variable {T : ℝ} [hT : Fact (0 < T)] theorem closedBall_ae_eq_ball {x : AddCircle T} {ε : ℝ} : closedBall x ε =ᵐ[volume] ball x ε := by rcases le_or_lt ε 0 with hε \| hε · rw [ball_eq_empty.mpr hε, ae_eq_empty, volume_closedBall, min_eq_right (by linarith [hT.out] : 2 * ε ≤ T), ENNReal.ofReal_eq_zero] exact mul_nonpos_of_nonneg_of_nonpos zero_le_two hε · suffices volume (closedBall x ε) ≤ volume (ball x ε) from (ae_eq_of_subset_of_measure_ge ball_subset_closedBall this measurableSet_ball.nullMeasurableSet (measure_ne_top _ _)).symm have : Tendsto (fun δ => volume (closedBall x δ)) (𝓝[<] ε) (𝓝 <\| volume (closedBall x ε)) := by simp_rw [volume_closedBall] refine ENNReal.tendsto_ofReal (Tendsto.min tendsto_const_nhds <\| Tendsto.const_mul _ ?_) exact nhdsWithin_le_nhds refine le_of_tendsto this <\| mem_of_superset (Ioo_mem_nhdsLT hε) fun r hr ↦ ?_ exact measure_mono (closedBall_subset_ball hr.2) /-- Let `G` be the subgroup of `AddCircle T` generated by a point `u` of finite order `n : ℕ`. Then any set `I` that is almost equal to a ball of radius `T / 2n` is a fundamental domain for the action of `G` on `AddCircle T` by left addition. -/ theorem isAddFundamentalDomain_of_ae_ball (I : Set <\| AddCircle T) (u x : AddCircle T) (hu : IsOfFinAddOrder u) (hI : I =ᵐ[volume] ball x (T / (2 * addOrderOf u))) : IsAddFundamentalDomain (AddSubgroup.zmultiples u) I := by	set G := AddSubgroup.zmultiples u set n := addOrderOf u set B := ball x (T / (2 * n)) have hn : 1 ≤ (n : ℝ) := by norm_cast; linarith [hu.addOrderOf_pos] refine IsAddFundamentalDomain.mk_of_measure_univ_le ?_ ?_ ?_ ?_ · -- `NullMeasurableSet I volume` exact measurableSet_ball.nullMeasurableSet.congr hI.symm · -- `∀ (g : G), g ≠ 0 → AEDisjoint volume (g +ᵥ I) I` rintro ⟨g, hg⟩ hg' replace hg' : g ≠ 0 := by simpa only [Ne, AddSubgroup.mk_eq_zero] using hg' change AEDisjoint volume (g +ᵥ I) I refine AEDisjoint.congr (Disjoint.aedisjoint ?_) ((quasiMeasurePreserving_add_left volume (-g)).vadd_ae_eq_of_ae_eq g hI) hI have hBg : g +ᵥ B = ball (g + x) (T / (2 * n)) := by rw [add_comm g x, ← singleton_add_ball _ x g, add_ball, thickening_singleton] rw [hBg] apply ball_disjoint_ball rw [dist_eq_norm, add_sub_cancel_right, div_mul_eq_div_div, ← add_div, ← add_div, add_self_div_two, div_le_iff₀' (by positivity : 0 < (n : ℝ)), ← nsmul_eq_mul] refine (le_add_order_smul_norm_of_isOfFinAddOrder (hu.of_mem_zmultiples hg) hg').trans (nsmul_le_nsmul_left (norm_nonneg g) ?_) exact Nat.le_of_dvd (addOrderOf_pos_iff.mpr hu) (addOrderOf_dvd_of_mem_zmultiples hg) · -- `∀ (g : G), QuasiMeasurePreserving (VAdd.vadd g) volume volume` exact fun g => quasiMeasurePreserving_add_left (G := AddCircle T) volume g · -- `volume univ ≤ ∑' (g : G), volume (g +ᵥ I)` replace hI := hI.trans closedBall_ae_eq_ball.symm haveI : Fintype G := @Fintype.ofFinite _ hu.finite_zmultiples.to_subtype have hG_card : #(Finset.univ : Finset G) = n := by show _ = addOrderOf u rw [← Nat.card_zmultiples, Nat.card_eq_fintype_card]; rfl simp_rw [measure_vadd] rw [AddCircle.measure_univ, tsum_fintype, Finset.sum_const, measure_congr hI, volume_closedBall, ← ENNReal.ofReal_nsmul, mul_div, mul_div_mul_comm, div_self, one_mul, min_eq_right (div_le_self hT.out.le hn), hG_card, nsmul_eq_mul, mul_div_cancel₀ T (lt_of_lt_of_le zero_lt_one hn).ne.symm] exact two_ne_zero theorem volume_of_add_preimage_eq (s I : Set <\| AddCircle T) (u x : AddCircle T) (hu : IsOfFinAddOrder u) (hs : (u +ᵥ s : Set <\| AddCircle T) =ᵐ[volume] s)	Mathlib/MeasureTheory/Group/AddCircle.lean	54	92
/- Copyright (c) 2017 Robert Y. Lewis. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Robert Y. Lewis, Keeley Hoek -/ import Mathlib.Algebra.NeZero import Mathlib.Data.Int.DivMod import Mathlib.Logic.Embedding.Basic import Mathlib.Logic.Equiv.Set import Mathlib.Tactic.Common import Mathlib.Tactic.Attr.Register /-! # The finite type with `n` elements `Fin n` is the type whose elements are natural numbers smaller than `n`. This file expands on the development in the core library. ## Main definitions ### Induction principles * `finZeroElim` : Elimination principle for the empty set `Fin 0`, generalizes `Fin.elim0`. Further definitions and eliminators can be found in `Init.Data.Fin.Lemmas` ### Embeddings and isomorphisms * `Fin.valEmbedding` : coercion to natural numbers as an `Embedding`; * `Fin.succEmb` : `Fin.succ` as an `Embedding`; * `Fin.castLEEmb h` : `Fin.castLE` as an `Embedding`, embed `Fin n` into `Fin m`, `h : n ≤ m`; * `finCongr` : `Fin.cast` as an `Equiv`, equivalence between `Fin n` and `Fin m` when `n = m`; * `Fin.castAddEmb m` : `Fin.castAdd` as an `Embedding`, embed `Fin n` into `Fin (n+m)`; * `Fin.castSuccEmb` : `Fin.castSucc` as an `Embedding`, embed `Fin n` into `Fin (n+1)`; * `Fin.addNatEmb m i` : `Fin.addNat` as an `Embedding`, add `m` on `i` on the right, generalizes `Fin.succ`; * `Fin.natAddEmb n i` : `Fin.natAdd` as an `Embedding`, adds `n` on `i` on the left; ### Other casts * `Fin.divNat i` : divides `i : Fin (m * n)` by `n`; * `Fin.modNat i` : takes the mod of `i : Fin (m * n)` by `n`; -/ assert_not_exists Monoid Finset open Fin Nat Function attribute [simp] Fin.succ_ne_zero Fin.castSucc_lt_last /-- Elimination principle for the empty set `Fin 0`, dependent version. -/ def finZeroElim {α : Fin 0 → Sort} (x : Fin 0) : α x := x.elim0 namespace Fin @[simp] theorem mk_eq_one {n a : Nat} {ha : a < n + 2} : (⟨a, ha⟩ : Fin (n + 2)) = 1 ↔ a = 1 := mk.inj_iff @[simp] theorem one_eq_mk {n a : Nat} {ha : a < n + 2} : 1 = (⟨a, ha⟩ : Fin (n + 2)) ↔ a = 1 := by simp [eq_comm] instance {n : ℕ} : CanLift ℕ (Fin n) Fin.val (· < n) where prf k hk := ⟨⟨k, hk⟩, rfl⟩ /-- A dependent variant of `Fin.elim0`. -/ def rec0 {α : Fin 0 → Sort} (i : Fin 0) : α i := absurd i.2 (Nat.not_lt_zero _) variable {n m : ℕ} --variable {a b : Fin n} -- this really breaks stuff theorem val_injective : Function.Injective (@Fin.val n) := @Fin.eq_of_val_eq n /-- If you actually have an element of `Fin n`, then the `n` is always positive -/ lemma size_positive : Fin n → 0 < n := Fin.pos lemma size_positive' [Nonempty (Fin n)] : 0 < n := ‹Nonempty (Fin n)›.elim Fin.pos protected theorem prop (a : Fin n) : a.val < n := a.2 lemma lt_last_iff_ne_last {a : Fin (n + 1)} : a < last n ↔ a ≠ last n := by simp [Fin.lt_iff_le_and_ne, le_last] lemma ne_zero_of_lt {a b : Fin (n + 1)} (hab : a < b) : b ≠ 0 := Fin.ne_of_gt <\| Fin.lt_of_le_of_lt a.zero_le hab lemma ne_last_of_lt {a b : Fin (n + 1)} (hab : a < b) : a ≠ last n := Fin.ne_of_lt <\| Fin.lt_of_lt_of_le hab b.le_last /-- Equivalence between `Fin n` and `{ i // i < n }`. -/ @[simps apply symm_apply] def equivSubtype : Fin n ≃ { i // i < n } where toFun a := ⟨a.1, a.2⟩ invFun a := ⟨a.1, a.2⟩ left_inv := fun ⟨_, _⟩ => rfl right_inv := fun ⟨_, _⟩ => rfl section coe /-! ### coercions and constructions -/ theorem val_eq_val (a b : Fin n) : (a : ℕ) = b ↔ a = b := Fin.ext_iff.symm theorem ne_iff_vne (a b : Fin n) : a ≠ b ↔ a.1 ≠ b.1 := Fin.ext_iff.not theorem mk_eq_mk {a h a' h'} : @mk n a h = @mk n a' h' ↔ a = a' := Fin.ext_iff -- syntactic tautologies now /-- Assume `k = l`. If two functions defined on `Fin k` and `Fin l` are equal on each element, then they coincide (in the heq sense). -/ protected theorem heq_fun_iff {α : Sort} {k l : ℕ} (h : k = l) {f : Fin k → α} {g : Fin l → α} : HEq f g ↔ ∀ i : Fin k, f i = g ⟨(i : ℕ), h ▸ i.2⟩ := by subst h simp [funext_iff] /-- Assume `k = l` and `k' = l'`. If two functions `Fin k → Fin k' → α` and `Fin l → Fin l' → α` are equal on each pair, then they coincide (in the heq sense). -/ protected theorem heq_fun₂_iff {α : Sort} {k l k' l' : ℕ} (h : k = l) (h' : k' = l') {f : Fin k → Fin k' → α} {g : Fin l → Fin l' → α} : HEq f g ↔ ∀ (i : Fin k) (j : Fin k'), f i j = g ⟨(i : ℕ), h ▸ i.2⟩ ⟨(j : ℕ), h' ▸ j.2⟩ := by subst h subst h' simp [funext_iff] /-- Two elements of `Fin k` and `Fin l` are heq iff their values in `ℕ` coincide. This requires `k = l`. For the left implication without this assumption, see `val_eq_val_of_heq`. -/ protected theorem heq_ext_iff {k l : ℕ} (h : k = l) {i : Fin k} {j : Fin l} : HEq i j ↔ (i : ℕ) = (j : ℕ) := by subst h simp [val_eq_val] end coe section Order /-! ### order -/ theorem le_iff_val_le_val {a b : Fin n} : a ≤ b ↔ (a : ℕ) ≤ b := Iff.rfl /-- `a < b` as natural numbers if and only if `a < b` in `Fin n`. -/ @[norm_cast, simp] theorem val_fin_lt {n : ℕ} {a b : Fin n} : (a : ℕ) < (b : ℕ) ↔ a < b := Iff.rfl /-- `a ≤ b` as natural numbers if and only if `a ≤ b` in `Fin n`. -/ @[norm_cast, simp] theorem val_fin_le {n : ℕ} {a b : Fin n} : (a : ℕ) ≤ (b : ℕ) ↔ a ≤ b := Iff.rfl theorem min_val {a : Fin n} : min (a : ℕ) n = a := by simp theorem max_val {a : Fin n} : max (a : ℕ) n = n := by simp /-- The inclusion map `Fin n → ℕ` is an embedding. -/ @[simps -fullyApplied apply] def valEmbedding : Fin n ↪ ℕ := ⟨val, val_injective⟩ @[simp] theorem equivSubtype_symm_trans_valEmbedding : equivSubtype.symm.toEmbedding.trans valEmbedding = Embedding.subtype (· < n) := rfl /-- Use the ordering on `Fin n` for checking recursive definitions. For example, the following definition is not accepted by the termination checker, unless we declare the `WellFoundedRelation` instance: ```lean def factorial {n : ℕ} : Fin n → ℕ \| ⟨0, _⟩ := 1 \| ⟨i + 1, hi⟩ := (i + 1) * factorial ⟨i, i.lt_succ_self.trans hi⟩ ``` -/ instance {n : ℕ} : WellFoundedRelation (Fin n) := measure (val : Fin n → ℕ) @[deprecated (since := "2025-02-24")] alias val_zero' := val_zero /-- `Fin.mk_zero` in `Lean` only applies in `Fin (n + 1)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ @[simp] theorem mk_zero' (n : ℕ) [NeZero n] : (⟨0, pos_of_neZero n⟩ : Fin n) = 0 := rfl /-- The `Fin.zero_le` in `Lean` only applies in `Fin (n+1)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ @[simp] protected theorem zero_le' [NeZero n] (a : Fin n) : 0 ≤ a := Nat.zero_le a.val @[simp, norm_cast] theorem val_eq_zero_iff [NeZero n] {a : Fin n} : a.val = 0 ↔ a = 0 := by rw [Fin.ext_iff, val_zero] theorem val_ne_zero_iff [NeZero n] {a : Fin n} : a.val ≠ 0 ↔ a ≠ 0 := val_eq_zero_iff.not @[simp, norm_cast] theorem val_pos_iff [NeZero n] {a : Fin n} : 0 < a.val ↔ 0 < a := by rw [← val_fin_lt, val_zero] /-- The `Fin.pos_iff_ne_zero` in `Lean` only applies in `Fin (n+1)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ theorem pos_iff_ne_zero' [NeZero n] (a : Fin n) : 0 < a ↔ a ≠ 0 := by rw [← val_pos_iff, Nat.pos_iff_ne_zero, val_ne_zero_iff] @[simp] lemma cast_eq_self (a : Fin n) : a.cast rfl = a := rfl @[simp] theorem cast_eq_zero {k l : ℕ} [NeZero k] [NeZero l] (h : k = l) (x : Fin k) : Fin.cast h x = 0 ↔ x = 0 := by simp [← val_eq_zero_iff] lemma cast_injective {k l : ℕ} (h : k = l) : Injective (Fin.cast h) := fun a b hab ↦ by simpa [← val_eq_val] using hab theorem last_pos' [NeZero n] : 0 < last n := n.pos_of_neZero theorem one_lt_last [NeZero n] : 1 < last (n + 1) := by rw [lt_iff_val_lt_val, val_one, val_last, Nat.lt_add_left_iff_pos, Nat.pos_iff_ne_zero] exact NeZero.ne n end Order /-! ### Coercions to `ℤ` and the `fin_omega` tactic. -/ open Int theorem coe_int_sub_eq_ite {n : Nat} (u v : Fin n) : ((u - v : Fin n) : Int) = if v ≤ u then (u - v : Int) else (u - v : Int) + n := by rw [Fin.sub_def] split · rw [natCast_emod, Int.emod_eq_sub_self_emod, Int.emod_eq_of_lt] <;> omega · rw [natCast_emod, Int.emod_eq_of_lt] <;> omega theorem coe_int_sub_eq_mod {n : Nat} (u v : Fin n) : ((u - v : Fin n) : Int) = ((u : Int) - (v : Int)) % n := by rw [coe_int_sub_eq_ite] split · rw [Int.emod_eq_of_lt] <;> omega · rw [Int.emod_eq_add_self_emod, Int.emod_eq_of_lt] <;> omega theorem coe_int_add_eq_ite {n : Nat} (u v : Fin n) : ((u + v : Fin n) : Int) = if (u + v : ℕ) < n then (u + v : Int) else (u + v : Int) - n := by rw [Fin.add_def] split · rw [natCast_emod, Int.emod_eq_of_lt] <;> omega · rw [natCast_emod, Int.emod_eq_sub_self_emod, Int.emod_eq_of_lt] <;> omega theorem coe_int_add_eq_mod {n : Nat} (u v : Fin n) : ((u + v : Fin n) : Int) = ((u : Int) + (v : Int)) % n := by rw [coe_int_add_eq_ite] split · rw [Int.emod_eq_of_lt] <;> omega · rw [Int.emod_eq_sub_self_emod, Int.emod_eq_of_lt] <;> omega -- Write `a + b` as `if (a + b : ℕ) < n then (a + b : ℤ) else (a + b : ℤ) - n` and -- similarly `a - b` as `if (b : ℕ) ≤ a then (a - b : ℤ) else (a - b : ℤ) + n`. attribute [fin_omega] coe_int_sub_eq_ite coe_int_add_eq_ite -- Rewrite inequalities in `Fin` to inequalities in `ℕ` attribute [fin_omega] Fin.lt_iff_val_lt_val Fin.le_iff_val_le_val -- Rewrite `1 : Fin (n + 2)` to `1 : ℤ` attribute [fin_omega] val_one /-- Preprocessor for `omega` to handle inequalities in `Fin`. Note that this involves a lot of case splitting, so may be slow. -/ -- Further adjustment to the simp set can probably make this more powerful. -- Please experiment and PR updates! macro "fin_omega" : tactic => `(tactic\| { try simp only [fin_omega, ← Int.ofNat_lt, ← Int.ofNat_le] at * omega }) section Add /-! ### addition, numerals, and coercion from Nat -/ @[simp] theorem val_one' (n : ℕ) [NeZero n] : ((1 : Fin n) : ℕ) = 1 % n := rfl @[deprecated val_one' (since := "2025-03-10")] theorem val_one'' {n : ℕ} : ((1 : Fin (n + 1)) : ℕ) = 1 % (n + 1) := rfl instance nontrivial {n : ℕ} : Nontrivial (Fin (n + 2)) where exists_pair_ne := ⟨0, 1, (ne_iff_vne 0 1).mpr (by simp [val_one, val_zero])⟩ theorem nontrivial_iff_two_le : Nontrivial (Fin n) ↔ 2 ≤ n := by rcases n with (_ \| _ \| n) <;> simp [Fin.nontrivial, not_nontrivial, Nat.succ_le_iff] section Monoid instance inhabitedFinOneAdd (n : ℕ) : Inhabited (Fin (1 + n)) := haveI : NeZero (1 + n) := by rw [Nat.add_comm]; infer_instance inferInstance @[simp] theorem default_eq_zero (n : ℕ) [NeZero n] : (default : Fin n) = 0 := rfl instance instNatCast [NeZero n] : NatCast (Fin n) where natCast i := Fin.ofNat' n i lemma natCast_def [NeZero n] (a : ℕ) : (a : Fin n) = ⟨a % n, mod_lt _ n.pos_of_neZero⟩ := rfl end Monoid theorem val_add_eq_ite {n : ℕ} (a b : Fin n) : (↑(a + b) : ℕ) = if n ≤ a + b then a + b - n else a + b := by rw [Fin.val_add, Nat.add_mod_eq_ite, Nat.mod_eq_of_lt (show ↑a < n from a.2), Nat.mod_eq_of_lt (show ↑b < n from b.2)] theorem val_add_eq_of_add_lt {n : ℕ} {a b : Fin n} (huv : a.val + b.val < n) : (a + b).val = a.val + b.val := by rw [val_add] simp [Nat.mod_eq_of_lt huv] lemma intCast_val_sub_eq_sub_add_ite {n : ℕ} (a b : Fin n) : ((a - b).val : ℤ) = a.val - b.val + if b ≤ a then 0 else n := by split <;> fin_omega lemma one_le_of_ne_zero {n : ℕ} [NeZero n] {k : Fin n} (hk : k ≠ 0) : 1 ≤ k := by obtain ⟨n, rfl⟩ := Nat.exists_eq_succ_of_ne_zero (NeZero.ne n) cases n with \| zero => simp only [Nat.reduceAdd, Fin.isValue, Fin.zero_le] \| succ n => rwa [Fin.le_iff_val_le_val, Fin.val_one, Nat.one_le_iff_ne_zero, val_ne_zero_iff] lemma val_sub_one_of_ne_zero [NeZero n] {i : Fin n} (hi : i ≠ 0) : (i - 1).val = i - 1 := by obtain ⟨n, rfl⟩ := Nat.exists_eq_succ_of_ne_zero (NeZero.ne n) rw [Fin.sub_val_of_le (one_le_of_ne_zero hi), Fin.val_one', Nat.mod_eq_of_lt (Nat.succ_le_iff.mpr (nontrivial_iff_two_le.mp <\| nontrivial_of_ne i 0 hi))] section OfNatCoe @[simp] theorem ofNat'_eq_cast (n : ℕ) [NeZero n] (a : ℕ) : Fin.ofNat' n a = a := rfl @[simp] lemma val_natCast (a n : ℕ) [NeZero n] : (a : Fin n).val = a % n := rfl /-- Converting an in-range number to `Fin (n + 1)` produces a result whose value is the original number. -/ theorem val_cast_of_lt {n : ℕ} [NeZero n] {a : ℕ} (h : a < n) : (a : Fin n).val = a := Nat.mod_eq_of_lt h /-- If `n` is non-zero, converting the value of a `Fin n` to `Fin n` results in the same value. -/ @[simp, norm_cast] theorem cast_val_eq_self {n : ℕ} [NeZero n] (a : Fin n) : (a.val : Fin n) = a := Fin.ext <\| val_cast_of_lt a.isLt -- This is a special case of `CharP.cast_eq_zero` that doesn't require typeclass search @[simp high] lemma natCast_self (n : ℕ) [NeZero n] : (n : Fin n) = 0 := by ext; simp @[simp] lemma natCast_eq_zero {a n : ℕ} [NeZero n] : (a : Fin n) = 0 ↔ n ∣ a := by simp [Fin.ext_iff, Nat.dvd_iff_mod_eq_zero] @[simp] theorem natCast_eq_last (n) : (n : Fin (n + 1)) = Fin.last n := by ext; simp theorem le_val_last (i : Fin (n + 1)) : i ≤ n := by rw [Fin.natCast_eq_last] exact Fin.le_last i variable {a b : ℕ} lemma natCast_le_natCast (han : a ≤ n) (hbn : b ≤ n) : (a : Fin (n + 1)) ≤ b ↔ a ≤ b := by rw [← Nat.lt_succ_iff] at han hbn simp [le_iff_val_le_val, -val_fin_le, Nat.mod_eq_of_lt, han, hbn] lemma natCast_lt_natCast (han : a ≤ n) (hbn : b ≤ n) : (a : Fin (n + 1)) < b ↔ a < b := by rw [← Nat.lt_succ_iff] at han hbn; simp [lt_iff_val_lt_val, Nat.mod_eq_of_lt, han, hbn] lemma natCast_mono (hbn : b ≤ n) (hab : a ≤ b) : (a : Fin (n + 1)) ≤ b := (natCast_le_natCast (hab.trans hbn) hbn).2 hab lemma natCast_strictMono (hbn : b ≤ n) (hab : a < b) : (a : Fin (n + 1)) < b := (natCast_lt_natCast (hab.le.trans hbn) hbn).2 hab end OfNatCoe end Add section Succ /-! ### succ and casts into larger Fin types -/ lemma succ_injective (n : ℕ) : Injective (@Fin.succ n) := fun a b ↦ by simp [Fin.ext_iff] /-- `Fin.succ` as an `Embedding` -/ def succEmb (n : ℕ) : Fin n ↪ Fin (n + 1) where toFun := succ inj' := succ_injective _ @[simp] theorem coe_succEmb : ⇑(succEmb n) = Fin.succ := rfl @[deprecated (since := "2025-04-12")] alias val_succEmb := coe_succEmb @[simp] theorem exists_succ_eq {x : Fin (n + 1)} : (∃ y, Fin.succ y = x) ↔ x ≠ 0 := ⟨fun ⟨_, hy⟩ => hy ▸ succ_ne_zero _, x.cases (fun h => h.irrefl.elim) (fun _ _ => ⟨_, rfl⟩)⟩ theorem exists_succ_eq_of_ne_zero {x : Fin (n + 1)} (h : x ≠ 0) : ∃ y, Fin.succ y = x := exists_succ_eq.mpr h @[simp] theorem succ_zero_eq_one' [NeZero n] : Fin.succ (0 : Fin n) = 1 := by cases n · exact (NeZero.ne 0 rfl).elim · rfl theorem one_pos' [NeZero n] : (0 : Fin (n + 1)) < 1 := succ_zero_eq_one' (n := n) ▸ succ_pos _ theorem zero_ne_one' [NeZero n] : (0 : Fin (n + 1)) ≠ 1 := Fin.ne_of_lt one_pos' /-- The `Fin.succ_one_eq_two` in `Lean` only applies in `Fin (n+2)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ @[simp] theorem succ_one_eq_two' [NeZero n] : Fin.succ (1 : Fin (n + 1)) = 2 := by cases n · exact (NeZero.ne 0 rfl).elim · rfl -- Version of `succ_one_eq_two` to be used by `dsimp`. -- Note the `'` swapped around due to a move to std4. /-- The `Fin.le_zero_iff` in `Lean` only applies in `Fin (n+1)`. This one instead uses a `NeZero n` typeclass hypothesis. -/ @[simp] theorem le_zero_iff' {n : ℕ} [NeZero n] {k : Fin n} : k ≤ 0 ↔ k = 0 := ⟨fun h => Fin.ext <\| by rw [Nat.eq_zero_of_le_zero h]; rfl, by rintro rfl; exact Nat.le_refl _⟩ -- TODO: Move to Batteries @[simp] lemma castLE_inj {hmn : m ≤ n} {a b : Fin m} : castLE hmn a = castLE hmn b ↔ a = b := by simp [Fin.ext_iff] @[simp] lemma castAdd_inj {a b : Fin m} : castAdd n a = castAdd n b ↔ a = b := by simp [Fin.ext_iff] attribute [simp] castSucc_inj lemma castLE_injective (hmn : m ≤ n) : Injective (castLE hmn) := fun _ _ hab ↦ Fin.ext (congr_arg val hab :) lemma castAdd_injective (m n : ℕ) : Injective (@Fin.castAdd m n) := castLE_injective _ lemma castSucc_injective (n : ℕ) : Injective (@Fin.castSucc n) := castAdd_injective _ _ /-- `Fin.castLE` as an `Embedding`, `castLEEmb h i` embeds `i` into a larger `Fin` type. -/ @[simps apply] def castLEEmb (h : n ≤ m) : Fin n ↪ Fin m where toFun := castLE h inj' := castLE_injective _ @[simp, norm_cast] lemma coe_castLEEmb {m n} (hmn : m ≤ n) : castLEEmb hmn = castLE hmn := rfl /- The next proof can be golfed a lot using `Fintype.card`. It is written this way to define `ENat.card` and `Nat.card` without a `Fintype` dependency (not done yet). -/ lemma nonempty_embedding_iff : Nonempty (Fin n ↪ Fin m) ↔ n ≤ m := by refine ⟨fun h ↦ ?_, fun h ↦ ⟨castLEEmb h⟩⟩ induction n generalizing m with \| zero => exact m.zero_le \| succ n ihn => obtain ⟨e⟩ := h rcases exists_eq_succ_of_ne_zero (pos_iff_nonempty.2 (Nonempty.map e inferInstance)).ne' with ⟨m, rfl⟩ refine Nat.succ_le_succ <\| ihn ⟨?_⟩ refine ⟨fun i ↦ (e.setValue 0 0 i.succ).pred (mt e.setValue_eq_iff.1 i.succ_ne_zero), fun i j h ↦ ?_⟩ simpa only [pred_inj, EmbeddingLike.apply_eq_iff_eq, succ_inj] using h lemma equiv_iff_eq : Nonempty (Fin m ≃ Fin n) ↔ m = n := ⟨fun ⟨e⟩ ↦ le_antisymm (nonempty_embedding_iff.1 ⟨e⟩) (nonempty_embedding_iff.1 ⟨e.symm⟩), fun h ↦ h ▸ ⟨.refl _⟩⟩ @[simp] lemma castLE_castSucc {n m} (i : Fin n) (h : n + 1 ≤ m) : i.castSucc.castLE h = i.castLE (Nat.le_of_succ_le h) := rfl @[simp] lemma castLE_comp_castSucc {n m} (h : n + 1 ≤ m) : Fin.castLE h ∘ Fin.castSucc = Fin.castLE (Nat.le_of_succ_le h) := rfl @[simp] lemma castLE_rfl (n : ℕ) : Fin.castLE (le_refl n) = id := rfl @[simp] theorem range_castLE {n k : ℕ} (h : n ≤ k) : Set.range (castLE h) = { i : Fin k \| (i : ℕ) < n } := Set.ext fun x => ⟨fun ⟨y, hy⟩ => hy ▸ y.2, fun hx => ⟨⟨x, hx⟩, rfl⟩⟩ @[simp] theorem coe_of_injective_castLE_symm {n k : ℕ} (h : n ≤ k) (i : Fin k) (hi) : ((Equiv.ofInjective _ (castLE_injective h)).symm ⟨i, hi⟩ : ℕ) = i := by rw [← coe_castLE h] exact congr_arg Fin.val (Equiv.apply_ofInjective_symm _ _) theorem leftInverse_cast (eq : n = m) : LeftInverse (Fin.cast eq.symm) (Fin.cast eq) := fun _ => rfl theorem rightInverse_cast (eq : n = m) : RightInverse (Fin.cast eq.symm) (Fin.cast eq) := fun _ => rfl @[simp] theorem cast_inj (eq : n = m) {a b : Fin n} : a.cast eq = b.cast eq ↔ a = b := by simp [← val_inj] @[simp] theorem cast_lt_cast (eq : n = m) {a b : Fin n} : a.cast eq < b.cast eq ↔ a < b := Iff.rfl @[simp] theorem cast_le_cast (eq : n = m) {a b : Fin n} : a.cast eq ≤ b.cast eq ↔ a ≤ b := Iff.rfl /-- The 'identity' equivalence between `Fin m` and `Fin n` when `m = n`. -/ @[simps] def _root_.finCongr (eq : n = m) : Fin n ≃ Fin m where toFun := Fin.cast eq invFun := Fin.cast eq.symm left_inv := leftInverse_cast eq right_inv := rightInverse_cast eq @[simp] lemma _root_.finCongr_apply_mk (h : m = n) (k : ℕ) (hk : k < m) : finCongr h ⟨k, hk⟩ = ⟨k, h ▸ hk⟩ := rfl @[simp] lemma _root_.finCongr_refl (h : n = n := rfl) : finCongr h = Equiv.refl (Fin n) := by ext; simp @[simp] lemma _root_.finCongr_symm (h : m = n) : (finCongr h).symm = finCongr h.symm := rfl @[simp] lemma _root_.finCongr_apply_coe (h : m = n) (k : Fin m) : (finCongr h k : ℕ) = k := rfl lemma _root_.finCongr_symm_apply_coe (h : m = n) (k : Fin n) : ((finCongr h).symm k : ℕ) = k := rfl /-- While in many cases `finCongr` is better than `Equiv.cast`/`cast`, sometimes we want to apply a generic theorem about `cast`. -/ lemma _root_.finCongr_eq_equivCast (h : n = m) : finCongr h = .cast (h ▸ rfl) := by subst h; simp /-- While in many cases `Fin.cast` is better than `Equiv.cast`/`cast`, sometimes we want to apply a generic theorem about `cast`. -/ theorem cast_eq_cast (h : n = m) : (Fin.cast h : Fin n → Fin m) = _root_.cast (h ▸ rfl) := by subst h ext rfl /-- `Fin.castAdd` as an `Embedding`, `castAddEmb m i` embeds `i : Fin n` in `Fin (n+m)`. See also `Fin.natAddEmb` and `Fin.addNatEmb`. -/ def castAddEmb (m) : Fin n ↪ Fin (n + m) := castLEEmb (le_add_right n m) @[simp] lemma coe_castAddEmb (m) : (castAddEmb m : Fin n → Fin (n + m)) = castAdd m := rfl lemma castAddEmb_apply (m) (i : Fin n) : castAddEmb m i = castAdd m i := rfl /-- `Fin.castSucc` as an `Embedding`, `castSuccEmb i` embeds `i : Fin n` in `Fin (n+1)`. -/ def castSuccEmb : Fin n ↪ Fin (n + 1) := castAddEmb _ @[simp, norm_cast] lemma coe_castSuccEmb : (castSuccEmb : Fin n → Fin (n + 1)) = Fin.castSucc := rfl	lemma castSuccEmb_apply (i : Fin n) : castSuccEmb i = i.castSucc := rfl	Mathlib/Data/Fin/Basic.lean	595	595
/- 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, Floris van Doorn -/ import Mathlib.Data.Countable.Small import Mathlib.Data.Fintype.BigOperators import Mathlib.Data.Fintype.Powerset import Mathlib.Data.Nat.Cast.Order.Basic import Mathlib.Data.Set.Countable import Mathlib.Logic.Equiv.Fin.Basic import Mathlib.Logic.Small.Set import Mathlib.Logic.UnivLE import Mathlib.SetTheory.Cardinal.Order /-! # Basic results on cardinal numbers We provide a collection of basic results on cardinal numbers, in particular focussing on finite/countable/small types and sets. ## Main definitions * `Cardinal.powerlt a b` or `a ^< b` is defined as the supremum of `a ^ c` for `c < b`. ## References * <https://en.wikipedia.org/wiki/Cardinal_number> ## Tags cardinal number, cardinal arithmetic, cardinal exponentiation, aleph, Cantor's theorem, König's theorem, Konig's theorem -/ assert_not_exists Field open List (Vector) open Function Order Set noncomputable section universe u v w v' w' variable {α β : Type u} namespace Cardinal /-! ### Lifting cardinals to a higher universe -/ @[simp] lemma mk_preimage_down {s : Set α} : #(ULift.down.{v} ⁻¹' s) = lift.{v} (#s) := by rw [← mk_uLift, Cardinal.eq] constructor let f : ULift.down ⁻¹' s → ULift s := fun x ↦ ULift.up (restrictPreimage s ULift.down x) have : Function.Bijective f := ULift.up_bijective.comp (restrictPreimage_bijective _ (ULift.down_bijective)) exact Equiv.ofBijective f this -- `simp` can't figure out universe levels: normal form is `lift_mk_shrink'`. theorem lift_mk_shrink (α : Type u) [Small.{v} α] : Cardinal.lift.{max u w} #(Shrink.{v} α) = Cardinal.lift.{max v w} #α := lift_mk_eq.2 ⟨(equivShrink α).symm⟩ @[simp] theorem lift_mk_shrink' (α : Type u) [Small.{v} α] : Cardinal.lift.{u} #(Shrink.{v} α) = Cardinal.lift.{v} #α := lift_mk_shrink.{u, v, 0} α @[simp] theorem lift_mk_shrink'' (α : Type max u v) [Small.{v} α] : Cardinal.lift.{u} #(Shrink.{v} α) = #α := by rw [← lift_umax, lift_mk_shrink.{max u v, v, 0} α, ← lift_umax, lift_id] theorem prod_eq_of_fintype {α : Type u} [h : Fintype α] (f : α → Cardinal.{v}) : prod f = Cardinal.lift.{u} (∏ i, f i) := by revert f refine Fintype.induction_empty_option ?_ ?_ ?_ α (h_fintype := h) · intro α β hβ e h f letI := Fintype.ofEquiv β e.symm rw [← e.prod_comp f, ← h] exact mk_congr (e.piCongrLeft _).symm · intro f rw [Fintype.univ_pempty, Finset.prod_empty, lift_one, Cardinal.prod, mk_eq_one] · intro α hα h f rw [Cardinal.prod, mk_congr Equiv.piOptionEquivProd, mk_prod, lift_umax.{v, u}, mk_out, ← Cardinal.prod, lift_prod, Fintype.prod_option, lift_mul, ← h fun a => f (some a)] simp only [lift_id] /-! ### Basic cardinals -/ theorem le_one_iff_subsingleton {α : Type u} : #α ≤ 1 ↔ Subsingleton α := ⟨fun ⟨f⟩ => ⟨fun _ _ => f.injective (Subsingleton.elim _ _)⟩, fun ⟨h⟩ => ⟨fun _ => ULift.up 0, fun _ _ _ => h _ _⟩⟩ @[simp] theorem mk_le_one_iff_set_subsingleton {s : Set α} : #s ≤ 1 ↔ s.Subsingleton := le_one_iff_subsingleton.trans s.subsingleton_coe alias ⟨_, _root_.Set.Subsingleton.cardinalMk_le_one⟩ := mk_le_one_iff_set_subsingleton @[deprecated (since := "2024-11-10")] alias _root_.Set.Subsingleton.cardinal_mk_le_one := Set.Subsingleton.cardinalMk_le_one private theorem cast_succ (n : ℕ) : ((n + 1 : ℕ) : Cardinal.{u}) = n + 1 := by change #(ULift.{u} _) = #(ULift.{u} _) + 1 rw [← mk_option] simp /-! ### Order properties -/ theorem one_lt_iff_nontrivial {α : Type u} : 1 < #α ↔ Nontrivial α := by rw [← not_le, le_one_iff_subsingleton, ← not_nontrivial_iff_subsingleton, Classical.not_not] lemma sInf_eq_zero_iff {s : Set Cardinal} : sInf s = 0 ↔ s = ∅ ∨ ∃ a ∈ s, a = 0 := by refine ⟨fun h ↦ ?_, fun h ↦ ?_⟩ · rcases s.eq_empty_or_nonempty with rfl \| hne · exact Or.inl rfl · exact Or.inr ⟨sInf s, csInf_mem hne, h⟩ · rcases h with rfl \| ⟨a, ha, rfl⟩ · exact Cardinal.sInf_empty · exact eq_bot_iff.2 (csInf_le' ha) lemma iInf_eq_zero_iff {ι : Sort} {f : ι → Cardinal} : (⨅ i, f i) = 0 ↔ IsEmpty ι ∨ ∃ i, f i = 0 := by simp [iInf, sInf_eq_zero_iff] /-- A variant of `ciSup_of_empty` but with `0` on the RHS for convenience -/ protected theorem iSup_of_empty {ι} (f : ι → Cardinal) [IsEmpty ι] : iSup f = 0 := ciSup_of_empty f @[simp] theorem lift_sInf (s : Set Cardinal) : lift.{u, v} (sInf s) = sInf (lift.{u, v} '' s) := by rcases eq_empty_or_nonempty s with (rfl \| hs) · simp · exact lift_monotone.map_csInf hs @[simp] theorem lift_iInf {ι} (f : ι → Cardinal) : lift.{u, v} (iInf f) = ⨅ i, lift.{u, v} (f i) := by unfold iInf convert lift_sInf (range f) simp_rw [← comp_apply (f := lift), range_comp] end Cardinal /-! ### Small sets of cardinals -/ namespace Cardinal instance small_Iic (a : Cardinal.{u}) : Small.{u} (Iic a) := by rw [← mk_out a] apply @small_of_surjective (Set a.out) (Iic #a.out) _ fun x => ⟨#x, mk_set_le x⟩ rintro ⟨x, hx⟩ simpa using le_mk_iff_exists_set.1 hx instance small_Iio (a : Cardinal.{u}) : Small.{u} (Iio a) := small_subset Iio_subset_Iic_self instance small_Icc (a b : Cardinal.{u}) : Small.{u} (Icc a b) := small_subset Icc_subset_Iic_self instance small_Ico (a b : Cardinal.{u}) : Small.{u} (Ico a b) := small_subset Ico_subset_Iio_self instance small_Ioc (a b : Cardinal.{u}) : Small.{u} (Ioc a b) := small_subset Ioc_subset_Iic_self instance small_Ioo (a b : Cardinal.{u}) : Small.{u} (Ioo a b) := small_subset Ioo_subset_Iio_self /-- A set of cardinals is bounded above iff it's small, i.e. it corresponds to a usual ZFC set. -/ theorem bddAbove_iff_small {s : Set Cardinal.{u}} : BddAbove s ↔ Small.{u} s := ⟨fun ⟨a, ha⟩ => @small_subset _ (Iic a) s (fun _ h => ha h) _, by rintro ⟨ι, ⟨e⟩⟩ use sum.{u, u} fun x ↦ e.symm x intro a ha simpa using le_sum (fun x ↦ e.symm x) (e ⟨a, ha⟩)⟩ theorem bddAbove_of_small (s : Set Cardinal.{u}) [h : Small.{u} s] : BddAbove s := bddAbove_iff_small.2 h theorem bddAbove_range {ι : Type} [Small.{u} ι] (f : ι → Cardinal.{u}) : BddAbove (Set.range f) := bddAbove_of_small _ theorem bddAbove_image (f : Cardinal.{u} → Cardinal.{max u v}) {s : Set Cardinal.{u}} (hs : BddAbove s) : BddAbove (f '' s) := by rw [bddAbove_iff_small] at hs ⊢ exact small_lift _ theorem bddAbove_range_comp {ι : Type u} {f : ι → Cardinal.{v}} (hf : BddAbove (range f)) (g : Cardinal.{v} → Cardinal.{max v w}) : BddAbove (range (g ∘ f)) := by rw [range_comp] exact bddAbove_image g hf /-- The type of cardinals in universe `u` is not `Small.{u}`. This is a version of the Burali-Forti paradox. -/ theorem _root_.not_small_cardinal : ¬ Small.{u} Cardinal.{max u v} := by intro h have := small_lift.{_, v} Cardinal.{max u v} rw [← small_univ_iff, ← bddAbove_iff_small] at this exact not_bddAbove_univ this instance uncountable : Uncountable Cardinal.{u} := Uncountable.of_not_small not_small_cardinal.{u} /-! ### Bounds on suprema -/ theorem sum_le_iSup_lift {ι : Type u} (f : ι → Cardinal.{max u v}) : sum f ≤ Cardinal.lift #ι * iSup f := by rw [← (iSup f).lift_id, ← lift_umax, lift_umax.{max u v, u}, ← sum_const] exact sum_le_sum _ _ (le_ciSup <\| bddAbove_of_small _) theorem sum_le_iSup {ι : Type u} (f : ι → Cardinal.{u}) : sum f ≤ #ι * iSup f := by rw [← lift_id #ι] exact sum_le_iSup_lift f /-- The lift of a supremum is the supremum of the lifts. -/ theorem lift_sSup {s : Set Cardinal} (hs : BddAbove s) : lift.{u} (sSup s) = sSup (lift.{u} '' s) := by apply ((le_csSup_iff' (bddAbove_image.{_,u} _ hs)).2 fun c hc => _).antisymm (csSup_le' _) · intro c hc by_contra h obtain ⟨d, rfl⟩ := Cardinal.mem_range_lift_of_le (not_le.1 h).le simp_rw [lift_le] at h hc rw [csSup_le_iff' hs] at h exact h fun a ha => lift_le.1 <\| hc (mem_image_of_mem _ ha) · rintro i ⟨j, hj, rfl⟩ exact lift_le.2 (le_csSup hs hj) /-- The lift of a supremum is the supremum of the lifts. -/ theorem lift_iSup {ι : Type v} {f : ι → Cardinal.{w}} (hf : BddAbove (range f)) : lift.{u} (iSup f) = ⨆ i, lift.{u} (f i) := by rw [iSup, iSup, lift_sSup hf, ← range_comp] simp [Function.comp_def] /-- To prove that the lift of a supremum is bounded by some cardinal `t`, it suffices to show that the lift of each cardinal is bounded by `t`. -/ theorem lift_iSup_le {ι : Type v} {f : ι → Cardinal.{w}} {t : Cardinal} (hf : BddAbove (range f)) (w : ∀ i, lift.{u} (f i) ≤ t) : lift.{u} (iSup f) ≤ t := by rw [lift_iSup hf] exact ciSup_le' w @[simp] theorem lift_iSup_le_iff {ι : Type v} {f : ι → Cardinal.{w}} (hf : BddAbove (range f)) {t : Cardinal} : lift.{u} (iSup f) ≤ t ↔ ∀ i, lift.{u} (f i) ≤ t := by rw [lift_iSup hf] exact ciSup_le_iff' (bddAbove_range_comp.{_,_,u} hf _) /-- To prove an inequality between the lifts to a common universe of two different supremums, it suffices to show that the lift of each cardinal from the smaller supremum if bounded by the lift of some cardinal from the larger supremum. -/ theorem lift_iSup_le_lift_iSup {ι : Type v} {ι' : Type v'} {f : ι → Cardinal.{w}} {f' : ι' → Cardinal.{w'}} (hf : BddAbove (range f)) (hf' : BddAbove (range f')) {g : ι → ι'} (h : ∀ i, lift.{w'} (f i) ≤ lift.{w} (f' (g i))) : lift.{w'} (iSup f) ≤ lift.{w} (iSup f') := by rw [lift_iSup hf, lift_iSup hf'] exact ciSup_mono' (bddAbove_range_comp.{_,_,w} hf' _) fun i => ⟨_, h i⟩ /-- A variant of `lift_iSup_le_lift_iSup` with universes specialized via `w = v` and `w' = v'`. This is sometimes necessary to avoid universe unification issues. -/ theorem lift_iSup_le_lift_iSup' {ι : Type v} {ι' : Type v'} {f : ι → Cardinal.{v}} {f' : ι' → Cardinal.{v'}} (hf : BddAbove (range f)) (hf' : BddAbove (range f')) (g : ι → ι') (h : ∀ i, lift.{v'} (f i) ≤ lift.{v} (f' (g i))) : lift.{v'} (iSup f) ≤ lift.{v} (iSup f') := lift_iSup_le_lift_iSup hf hf' h /-! ### Properties about the cast from `ℕ` -/ theorem mk_finset_of_fintype [Fintype α] : #(Finset α) = 2 ^ Fintype.card α := by simp [Pow.pow] @[norm_cast] theorem nat_succ (n : ℕ) : (n.succ : Cardinal) = succ ↑n := by rw [Nat.cast_succ] refine (add_one_le_succ _).antisymm (succ_le_of_lt ?_) rw [← Nat.cast_succ] exact Nat.cast_lt.2 (Nat.lt_succ_self _) lemma succ_natCast (n : ℕ) : Order.succ (n : Cardinal) = n + 1 := by rw [← Cardinal.nat_succ] norm_cast lemma natCast_add_one_le_iff {n : ℕ} {c : Cardinal} : n + 1 ≤ c ↔ n < c := by rw [← Order.succ_le_iff, Cardinal.succ_natCast] lemma two_le_iff_one_lt {c : Cardinal} : 2 ≤ c ↔ 1 < c := by convert natCast_add_one_le_iff norm_cast @[simp] theorem succ_zero : succ (0 : Cardinal) = 1 := by norm_cast -- This works generally to prove inequalities between numeric cardinals. theorem one_lt_two : (1 : Cardinal) < 2 := by norm_cast theorem exists_finset_le_card (α : Type) (n : ℕ) (h : n ≤ #α) : ∃ s : Finset α, n ≤ s.card := by obtain hα\|hα := finite_or_infinite α · let hα := Fintype.ofFinite α use Finset.univ simpa only [mk_fintype, Nat.cast_le] using h · obtain ⟨s, hs⟩ := Infinite.exists_subset_card_eq α n exact ⟨s, hs.ge⟩ theorem card_le_of {α : Type u} {n : ℕ} (H : ∀ s : Finset α, s.card ≤ n) : #α ≤ n := by contrapose! H apply exists_finset_le_card α (n+1) simpa only [nat_succ, succ_le_iff] using H theorem cantor' (a) {b : Cardinal} (hb : 1 < b) : a < b ^ a := by rw [← succ_le_iff, (by norm_cast : succ (1 : Cardinal) = 2)] at hb exact (cantor a).trans_le (power_le_power_right hb) theorem one_le_iff_pos {c : Cardinal} : 1 ≤ c ↔ 0 < c := by rw [← succ_zero, succ_le_iff] theorem one_le_iff_ne_zero {c : Cardinal} : 1 ≤ c ↔ c ≠ 0 := by rw [one_le_iff_pos, pos_iff_ne_zero] @[simp] theorem lt_one_iff_zero {c : Cardinal} : c < 1 ↔ c = 0 := by simpa using lt_succ_bot_iff (a := c) /-! ### Properties about `aleph0` -/ theorem nat_lt_aleph0 (n : ℕ) : (n : Cardinal.{u}) < ℵ₀ := succ_le_iff.1 (by rw [← nat_succ, ← lift_mk_fin, aleph0, lift_mk_le.{u}] exact ⟨⟨(↑), fun a b => Fin.ext⟩⟩) @[simp] theorem one_lt_aleph0 : 1 < ℵ₀ := by simpa using nat_lt_aleph0 1 @[simp] theorem one_le_aleph0 : 1 ≤ ℵ₀ := one_lt_aleph0.le theorem lt_aleph0 {c : Cardinal} : c < ℵ₀ ↔ ∃ n : ℕ, c = n := ⟨fun h => by rcases lt_lift_iff.1 h with ⟨c, h', rfl⟩ rcases le_mk_iff_exists_set.1 h'.1 with ⟨S, rfl⟩ suffices S.Finite by lift S to Finset ℕ using this simp contrapose! h' haveI := Infinite.to_subtype h' exact ⟨Infinite.natEmbedding S⟩, fun ⟨_, e⟩ => e.symm ▸ nat_lt_aleph0 _⟩ lemma succ_eq_of_lt_aleph0 {c : Cardinal} (h : c < ℵ₀) : Order.succ c = c + 1 := by obtain ⟨n, hn⟩ := Cardinal.lt_aleph0.mp h rw [hn, succ_natCast] theorem aleph0_le {c : Cardinal} : ℵ₀ ≤ c ↔ ∀ n : ℕ, ↑n ≤ c := ⟨fun h _ => (nat_lt_aleph0 _).le.trans h, fun h => le_of_not_lt fun hn => by rcases lt_aleph0.1 hn with ⟨n, rfl⟩ exact (Nat.lt_succ_self _).not_le (Nat.cast_le.1 (h (n + 1)))⟩ theorem isSuccPrelimit_aleph0 : IsSuccPrelimit ℵ₀ := isSuccPrelimit_of_succ_lt fun a ha => by rcases lt_aleph0.1 ha with ⟨n, rfl⟩ rw [← nat_succ] apply nat_lt_aleph0 theorem isSuccLimit_aleph0 : IsSuccLimit ℵ₀ := by rw [Cardinal.isSuccLimit_iff] exact ⟨aleph0_ne_zero, isSuccPrelimit_aleph0⟩ lemma not_isSuccLimit_natCast : (n : ℕ) → ¬ IsSuccLimit (n : Cardinal.{u}) \| 0, e => e.1 isMin_bot \| Nat.succ n, e => Order.not_isSuccPrelimit_succ _ (nat_succ n ▸ e.2) theorem not_isSuccLimit_of_lt_aleph0 {c : Cardinal} (h : c < ℵ₀) : ¬ IsSuccLimit c := by obtain ⟨n, rfl⟩ := lt_aleph0.1 h exact not_isSuccLimit_natCast n theorem aleph0_le_of_isSuccLimit {c : Cardinal} (h : IsSuccLimit c) : ℵ₀ ≤ c := by contrapose! h exact not_isSuccLimit_of_lt_aleph0 h theorem isStrongLimit_aleph0 : IsStrongLimit ℵ₀ := by refine ⟨aleph0_ne_zero, fun x hx ↦ ?_⟩ obtain ⟨n, rfl⟩ := lt_aleph0.1 hx exact_mod_cast nat_lt_aleph0 _ theorem IsStrongLimit.aleph0_le {c} (H : IsStrongLimit c) : ℵ₀ ≤ c := aleph0_le_of_isSuccLimit H.isSuccLimit lemma exists_eq_natCast_of_iSup_eq {ι : Type u} [Nonempty ι] (f : ι → Cardinal.{v}) (hf : BddAbove (range f)) (n : ℕ) (h : ⨆ i, f i = n) : ∃ i, f i = n := exists_eq_of_iSup_eq_of_not_isSuccLimit.{u, v} f hf (not_isSuccLimit_natCast n) h @[simp] theorem range_natCast : range ((↑) : ℕ → Cardinal) = Iio ℵ₀ := ext fun x => by simp only [mem_Iio, mem_range, eq_comm, lt_aleph0] theorem mk_eq_nat_iff {α : Type u} {n : ℕ} : #α = n ↔ Nonempty (α ≃ Fin n) := by rw [← lift_mk_fin, ← lift_uzero #α, lift_mk_eq'] theorem lt_aleph0_iff_finite {α : Type u} : #α < ℵ₀ ↔ Finite α := by simp only [lt_aleph0, mk_eq_nat_iff, finite_iff_exists_equiv_fin] theorem lt_aleph0_iff_fintype {α : Type u} : #α < ℵ₀ ↔ Nonempty (Fintype α) := lt_aleph0_iff_finite.trans (finite_iff_nonempty_fintype _) theorem lt_aleph0_of_finite (α : Type u) [Finite α] : #α < ℵ₀ := lt_aleph0_iff_finite.2 ‹_› theorem lt_aleph0_iff_set_finite {S : Set α} : #S < ℵ₀ ↔ S.Finite := lt_aleph0_iff_finite.trans finite_coe_iff alias ⟨_, _root_.Set.Finite.lt_aleph0⟩ := lt_aleph0_iff_set_finite @[simp] theorem lt_aleph0_iff_subtype_finite {p : α → Prop} : #{ x // p x } < ℵ₀ ↔ { x \| p x }.Finite := lt_aleph0_iff_set_finite theorem mk_le_aleph0_iff : #α ≤ ℵ₀ ↔ Countable α := by rw [countable_iff_nonempty_embedding, aleph0, ← lift_uzero #α, lift_mk_le'] @[simp] theorem mk_le_aleph0 [Countable α] : #α ≤ ℵ₀ := mk_le_aleph0_iff.mpr ‹_› theorem le_aleph0_iff_set_countable {s : Set α} : #s ≤ ℵ₀ ↔ s.Countable := mk_le_aleph0_iff alias ⟨_, _root_.Set.Countable.le_aleph0⟩ := le_aleph0_iff_set_countable @[simp] theorem le_aleph0_iff_subtype_countable {p : α → Prop} : #{ x // p x } ≤ ℵ₀ ↔ { x \| p x }.Countable := le_aleph0_iff_set_countable theorem aleph0_lt_mk_iff : ℵ₀ < #α ↔ Uncountable α := by rw [← not_le, ← not_countable_iff, not_iff_not, mk_le_aleph0_iff] @[simp] theorem aleph0_lt_mk [Uncountable α] : ℵ₀ < #α := aleph0_lt_mk_iff.mpr ‹_› instance canLiftCardinalNat : CanLift Cardinal ℕ (↑) fun x => x < ℵ₀ := ⟨fun _ hx => let ⟨n, hn⟩ := lt_aleph0.mp hx ⟨n, hn.symm⟩⟩ theorem add_lt_aleph0 {a b : Cardinal} (ha : a < ℵ₀) (hb : b < ℵ₀) : a + b < ℵ₀ := match a, b, lt_aleph0.1 ha, lt_aleph0.1 hb with \| _, _, ⟨m, rfl⟩, ⟨n, rfl⟩ => by rw [← Nat.cast_add]; apply nat_lt_aleph0 theorem add_lt_aleph0_iff {a b : Cardinal} : a + b < ℵ₀ ↔ a < ℵ₀ ∧ b < ℵ₀ := ⟨fun h => ⟨(self_le_add_right _ _).trans_lt h, (self_le_add_left _ _).trans_lt h⟩, fun ⟨h1, h2⟩ => add_lt_aleph0 h1 h2⟩ theorem aleph0_le_add_iff {a b : Cardinal} : ℵ₀ ≤ a + b ↔ ℵ₀ ≤ a ∨ ℵ₀ ≤ b := by simp only [← not_lt, add_lt_aleph0_iff, not_and_or] /-- See also `Cardinal.nsmul_lt_aleph0_iff_of_ne_zero` if you already have `n ≠ 0`. -/ theorem nsmul_lt_aleph0_iff {n : ℕ} {a : Cardinal} : n • a < ℵ₀ ↔ n = 0 ∨ a < ℵ₀ := by cases n with \| zero => simpa using nat_lt_aleph0 0 \| succ n => simp only [Nat.succ_ne_zero, false_or] induction' n with n ih · simp rw [succ_nsmul, add_lt_aleph0_iff, ih, and_self_iff] /-- See also `Cardinal.nsmul_lt_aleph0_iff` for a hypothesis-free version. -/ theorem nsmul_lt_aleph0_iff_of_ne_zero {n : ℕ} {a : Cardinal} (h : n ≠ 0) : n • a < ℵ₀ ↔ a < ℵ₀ := nsmul_lt_aleph0_iff.trans <\| or_iff_right h theorem mul_lt_aleph0 {a b : Cardinal} (ha : a < ℵ₀) (hb : b < ℵ₀) : a b < ℵ₀ := match a, b, lt_aleph0.1 ha, lt_aleph0.1 hb with \| _, _, ⟨m, rfl⟩, ⟨n, rfl⟩ => by rw [← Nat.cast_mul]; apply nat_lt_aleph0 theorem mul_lt_aleph0_iff {a b : Cardinal} : a * b < ℵ₀ ↔ a = 0 ∨ b = 0 ∨ a < ℵ₀ ∧ b < ℵ₀ := by refine ⟨fun h => ?_, ?_⟩ · by_cases ha : a = 0 · exact Or.inl ha right by_cases hb : b = 0 · exact Or.inl hb right rw [← Ne, ← one_le_iff_ne_zero] at ha hb constructor · rw [← mul_one a] exact (mul_le_mul' le_rfl hb).trans_lt h · rw [← one_mul b] exact (mul_le_mul' ha le_rfl).trans_lt h rintro (rfl \| rfl \| ⟨ha, hb⟩) <;> simp only [, mul_lt_aleph0, aleph0_pos, zero_mul, mul_zero] /-- See also `Cardinal.aleph0_le_mul_iff`. -/ theorem aleph0_le_mul_iff {a b : Cardinal} : ℵ₀ ≤ a b ↔ a ≠ 0 ∧ b ≠ 0 ∧ (ℵ₀ ≤ a ∨ ℵ₀ ≤ b) := by let h := (@mul_lt_aleph0_iff a b).not rwa [not_lt, not_or, not_or, not_and_or, not_lt, not_lt] at h /-- See also `Cardinal.aleph0_le_mul_iff'`. -/ theorem aleph0_le_mul_iff' {a b : Cardinal.{u}} : ℵ₀ ≤ a * b ↔ a ≠ 0 ∧ ℵ₀ ≤ b ∨ ℵ₀ ≤ a ∧ b ≠ 0 := by have : ∀ {a : Cardinal.{u}}, ℵ₀ ≤ a → a ≠ 0 := fun a => ne_bot_of_le_ne_bot aleph0_ne_zero a simp only [aleph0_le_mul_iff, and_or_left, and_iff_right_of_imp this, @and_left_comm (a ≠ 0)] simp only [and_comm, or_comm] theorem mul_lt_aleph0_iff_of_ne_zero {a b : Cardinal} (ha : a ≠ 0) (hb : b ≠ 0) : a * b < ℵ₀ ↔ a < ℵ₀ ∧ b < ℵ₀ := by simp [mul_lt_aleph0_iff, ha, hb] theorem power_lt_aleph0 {a b : Cardinal} (ha : a < ℵ₀) (hb : b < ℵ₀) : a ^ b < ℵ₀ := match a, b, lt_aleph0.1 ha, lt_aleph0.1 hb with \| _, _, ⟨m, rfl⟩, ⟨n, rfl⟩ => by rw [power_natCast, ← Nat.cast_pow]; apply nat_lt_aleph0 theorem eq_one_iff_unique {α : Type} : #α = 1 ↔ Subsingleton α ∧ Nonempty α := calc #α = 1 ↔ #α ≤ 1 ∧ 1 ≤ #α := le_antisymm_iff _ ↔ Subsingleton α ∧ Nonempty α := le_one_iff_subsingleton.and (one_le_iff_ne_zero.trans mk_ne_zero_iff) theorem infinite_iff {α : Type u} : Infinite α ↔ ℵ₀ ≤ #α := by rw [← not_lt, lt_aleph0_iff_finite, not_finite_iff_infinite] lemma aleph0_le_mk_iff : ℵ₀ ≤ #α ↔ Infinite α := infinite_iff.symm lemma mk_lt_aleph0_iff : #α < ℵ₀ ↔ Finite α := by simp [← not_le, aleph0_le_mk_iff] @[simp] lemma mk_lt_aleph0 [Finite α] : #α < ℵ₀ := mk_lt_aleph0_iff.2 ‹_› @[simp] theorem aleph0_le_mk (α : Type u) [Infinite α] : ℵ₀ ≤ #α := infinite_iff.1 ‹_› @[simp] theorem mk_eq_aleph0 (α : Type) [Countable α] [Infinite α] : #α = ℵ₀ := mk_le_aleph0.antisymm <\| aleph0_le_mk _ theorem denumerable_iff {α : Type u} : Nonempty (Denumerable α) ↔ #α = ℵ₀ := ⟨fun ⟨h⟩ => mk_congr ((@Denumerable.eqv α h).trans Equiv.ulift.symm), fun h => by obtain ⟨f⟩ := Quotient.exact h exact ⟨Denumerable.mk' <\| f.trans Equiv.ulift⟩⟩ theorem mk_denumerable (α : Type u) [Denumerable α] : #α = ℵ₀ := denumerable_iff.1 ⟨‹_›⟩ theorem _root_.Set.countable_infinite_iff_nonempty_denumerable {α : Type} {s : Set α} : s.Countable ∧ s.Infinite ↔ Nonempty (Denumerable s) := by rw [nonempty_denumerable_iff, ← Set.infinite_coe_iff, countable_coe_iff] @[simp] theorem aleph0_add_aleph0 : ℵ₀ + ℵ₀ = ℵ₀ := mk_denumerable _ theorem aleph0_mul_aleph0 : ℵ₀ ℵ₀ = ℵ₀ := mk_denumerable _ @[simp] theorem nat_mul_aleph0 {n : ℕ} (hn : n ≠ 0) : ↑n * ℵ₀ = ℵ₀ := le_antisymm (lift_mk_fin n ▸ mk_le_aleph0) <\| le_mul_of_one_le_left (zero_le _) <\| by rwa [← Nat.cast_one, Nat.cast_le, Nat.one_le_iff_ne_zero] @[simp] theorem aleph0_mul_nat {n : ℕ} (hn : n ≠ 0) : ℵ₀ * n = ℵ₀ := by rw [mul_comm, nat_mul_aleph0 hn] @[simp] theorem ofNat_mul_aleph0 {n : ℕ} [Nat.AtLeastTwo n] : ofNat(n) * ℵ₀ = ℵ₀ := nat_mul_aleph0 (NeZero.ne n) @[simp] theorem aleph0_mul_ofNat {n : ℕ} [Nat.AtLeastTwo n] : ℵ₀ * ofNat(n) = ℵ₀ := aleph0_mul_nat (NeZero.ne n) @[simp] theorem add_le_aleph0 {c₁ c₂ : Cardinal} : c₁ + c₂ ≤ ℵ₀ ↔ c₁ ≤ ℵ₀ ∧ c₂ ≤ ℵ₀ := ⟨fun h => ⟨le_self_add.trans h, le_add_self.trans h⟩, fun h => aleph0_add_aleph0 ▸ add_le_add h.1 h.2⟩ @[simp] theorem aleph0_add_nat (n : ℕ) : ℵ₀ + n = ℵ₀ := (add_le_aleph0.2 ⟨le_rfl, (nat_lt_aleph0 n).le⟩).antisymm le_self_add @[simp] theorem nat_add_aleph0 (n : ℕ) : ↑n + ℵ₀ = ℵ₀ := by rw [add_comm, aleph0_add_nat] @[simp] theorem ofNat_add_aleph0 {n : ℕ} [Nat.AtLeastTwo n] : ofNat(n) + ℵ₀ = ℵ₀ := nat_add_aleph0 n @[simp] theorem aleph0_add_ofNat {n : ℕ} [Nat.AtLeastTwo n] : ℵ₀ + ofNat(n) = ℵ₀ := aleph0_add_nat n theorem exists_nat_eq_of_le_nat {c : Cardinal} {n : ℕ} (h : c ≤ n) : ∃ m, m ≤ n ∧ c = m := by lift c to ℕ using h.trans_lt (nat_lt_aleph0 _) exact ⟨c, mod_cast h, rfl⟩ theorem mk_int : #ℤ = ℵ₀ := mk_denumerable ℤ theorem mk_pnat : #ℕ+ = ℵ₀ := mk_denumerable ℕ+ @[deprecated (since := "2025-04-27")] alias mk_pNat := mk_pnat /-! ### Cardinalities of basic sets and types -/ @[simp] theorem mk_additive : #(Additive α) = #α := rfl @[simp] theorem mk_multiplicative : #(Multiplicative α) = #α := rfl @[to_additive (attr := simp)] theorem mk_mulOpposite : #(MulOpposite α) = #α := mk_congr MulOpposite.opEquiv.symm theorem mk_singleton {α : Type u} (x : α) : #({x} : Set α) = 1 := mk_eq_one _ @[simp] theorem mk_vector (α : Type u) (n : ℕ) : #(List.Vector α n) = #α ^ n := (mk_congr (Equiv.vectorEquivFin α n)).trans <\| by simp theorem mk_list_eq_sum_pow (α : Type u) : #(List α) = sum fun n : ℕ => #α ^ n := calc #(List α) = #(Σn, List.Vector α n) := mk_congr (Equiv.sigmaFiberEquiv List.length).symm _ = sum fun n : ℕ => #α ^ n := by simp theorem mk_quot_le {α : Type u} {r : α → α → Prop} : #(Quot r) ≤ #α := mk_le_of_surjective Quot.exists_rep theorem mk_quotient_le {α : Type u} {s : Setoid α} : #(Quotient s) ≤ #α := mk_quot_le theorem mk_subtype_le_of_subset {α : Type u} {p q : α → Prop} (h : ∀ ⦃x⦄, p x → q x) : #(Subtype p) ≤ #(Subtype q) := ⟨Embedding.subtypeMap (Embedding.refl α) h⟩ theorem mk_emptyCollection (α : Type u) : #(∅ : Set α) = 0 := mk_eq_zero _ theorem mk_emptyCollection_iff {α : Type u} {s : Set α} : #s = 0 ↔ s = ∅ := by constructor · intro h rw [mk_eq_zero_iff] at h exact eq_empty_iff_forall_not_mem.2 fun x hx => h.elim' ⟨x, hx⟩ · rintro rfl exact mk_emptyCollection _ @[simp] theorem mk_univ {α : Type u} : #(@univ α) = #α := mk_congr (Equiv.Set.univ α) @[simp] lemma mk_setProd {α β : Type u} (s : Set α) (t : Set β) : #(s ×ˢ t) = #s * #t := by rw [mul_def, mk_congr (Equiv.Set.prod ..)] theorem mk_image_le {α β : Type u} {f : α → β} {s : Set α} : #(f '' s) ≤ #s := mk_le_of_surjective surjective_onto_image lemma mk_image2_le {α β γ : Type u} {f : α → β → γ} {s : Set α} {t : Set β} : #(image2 f s t) ≤ #s * #t := by rw [← image_uncurry_prod, ← mk_setProd] exact mk_image_le theorem mk_image_le_lift {α : Type u} {β : Type v} {f : α → β} {s : Set α} : lift.{u} #(f '' s) ≤ lift.{v} #s := lift_mk_le.{0}.mpr ⟨Embedding.ofSurjective _ surjective_onto_image⟩ theorem mk_range_le {α β : Type u} {f : α → β} : #(range f) ≤ #α := mk_le_of_surjective surjective_onto_range theorem mk_range_le_lift {α : Type u} {β : Type v} {f : α → β} : lift.{u} #(range f) ≤ lift.{v} #α := lift_mk_le.{0}.mpr ⟨Embedding.ofSurjective _ surjective_onto_range⟩ theorem mk_range_eq (f : α → β) (h : Injective f) : #(range f) = #α := mk_congr (Equiv.ofInjective f h).symm theorem mk_range_eq_lift {α : Type u} {β : Type v} {f : α → β} (hf : Injective f) : lift.{max u w} #(range f) = lift.{max v w} #α := lift_mk_eq.{v,u,w}.mpr ⟨(Equiv.ofInjective f hf).symm⟩ theorem mk_range_eq_of_injective {α : Type u} {β : Type v} {f : α → β} (hf : Injective f) : lift.{u} #(range f) = lift.{v} #α := lift_mk_eq'.mpr ⟨(Equiv.ofInjective f hf).symm⟩ lemma lift_mk_le_lift_mk_of_injective {α : Type u} {β : Type v} {f : α → β} (hf : Injective f) : Cardinal.lift.{v} (#α) ≤ Cardinal.lift.{u} (#β) := by rw [← Cardinal.mk_range_eq_of_injective hf] exact Cardinal.lift_le.2 (Cardinal.mk_set_le _) lemma lift_mk_le_lift_mk_of_surjective {α : Type u} {β : Type v} {f : α → β} (hf : Surjective f) : Cardinal.lift.{u} (#β) ≤ Cardinal.lift.{v} (#α) := lift_mk_le_lift_mk_of_injective (injective_surjInv hf) theorem mk_image_eq_of_injOn {α β : Type u} (f : α → β) (s : Set α) (h : InjOn f s) : #(f '' s) = #s := mk_congr (Equiv.Set.imageOfInjOn f s h).symm theorem mk_image_eq_of_injOn_lift {α : Type u} {β : Type v} (f : α → β) (s : Set α) (h : InjOn f s) : lift.{u} #(f '' s) = lift.{v} #s := lift_mk_eq.{v, u, 0}.mpr ⟨(Equiv.Set.imageOfInjOn f s h).symm⟩ theorem mk_image_eq {α β : Type u} {f : α → β} {s : Set α} (hf : Injective f) : #(f '' s) = #s := mk_image_eq_of_injOn _ _ hf.injOn theorem mk_image_eq_lift {α : Type u} {β : Type v} (f : α → β) (s : Set α) (h : Injective f) : lift.{u} #(f '' s) = lift.{v} #s := mk_image_eq_of_injOn_lift _ _ h.injOn @[simp] theorem mk_image_embedding_lift {β : Type v} (f : α ↪ β) (s : Set α) : lift.{u} #(f '' s) = lift.{v} #s := mk_image_eq_lift _ _ f.injective @[simp] theorem mk_image_embedding (f : α ↪ β) (s : Set α) : #(f '' s) = #s := by simpa using mk_image_embedding_lift f s theorem mk_iUnion_le_sum_mk {α ι : Type u} {f : ι → Set α} : #(⋃ i, f i) ≤ sum fun i => #(f i) := calc #(⋃ i, f i) ≤ #(Σi, f i) := mk_le_of_surjective (Set.sigmaToiUnion_surjective f) _ = sum fun i => #(f i) := mk_sigma _ theorem mk_iUnion_le_sum_mk_lift {α : Type u} {ι : Type v} {f : ι → Set α} : lift.{v} #(⋃ i, f i) ≤ sum fun i => #(f i) := calc lift.{v} #(⋃ i, f i) ≤ #(Σi, f i) := mk_le_of_surjective <\| ULift.up_surjective.comp (Set.sigmaToiUnion_surjective f) _ = sum fun i => #(f i) := mk_sigma _ theorem mk_iUnion_eq_sum_mk {α ι : Type u} {f : ι → Set α} (h : Pairwise (Disjoint on f)) : #(⋃ i, f i) = sum fun i => #(f i) := calc #(⋃ i, f i) = #(Σi, f i) := mk_congr (Set.unionEqSigmaOfDisjoint h) _ = sum fun i => #(f i) := mk_sigma _ theorem mk_iUnion_eq_sum_mk_lift {α : Type u} {ι : Type v} {f : ι → Set α} (h : Pairwise (Disjoint on f)) : lift.{v} #(⋃ i, f i) = sum fun i => #(f i) := calc lift.{v} #(⋃ i, f i) = #(Σi, f i) := mk_congr <\| .trans Equiv.ulift (Set.unionEqSigmaOfDisjoint h) _ = sum fun i => #(f i) := mk_sigma _ theorem mk_iUnion_le {α ι : Type u} (f : ι → Set α) : #(⋃ i, f i) ≤ #ι * ⨆ i, #(f i) := mk_iUnion_le_sum_mk.trans (sum_le_iSup _) theorem mk_iUnion_le_lift {α : Type u} {ι : Type v} (f : ι → Set α) : lift.{v} #(⋃ i, f i) ≤ lift.{u} #ι * ⨆ i, lift.{v} #(f i) := by refine mk_iUnion_le_sum_mk_lift.trans <\| Eq.trans_le ?_ (sum_le_iSup_lift _) rw [← lift_sum, lift_id'.{_,u}] theorem mk_sUnion_le {α : Type u} (A : Set (Set α)) : #(⋃₀ A) ≤ #A * ⨆ s : A, #s := by rw [sUnion_eq_iUnion] apply mk_iUnion_le theorem mk_biUnion_le {ι α : Type u} (A : ι → Set α) (s : Set ι) : #(⋃ x ∈ s, A x) ≤ #s * ⨆ x : s, #(A x.1) := by rw [biUnion_eq_iUnion] apply mk_iUnion_le theorem mk_biUnion_le_lift {α : Type u} {ι : Type v} (A : ι → Set α) (s : Set ι) : lift.{v} #(⋃ x ∈ s, A x) ≤ lift.{u} #s * ⨆ x : s, lift.{v} #(A x.1) := by rw [biUnion_eq_iUnion] apply mk_iUnion_le_lift theorem finset_card_lt_aleph0 (s : Finset α) : #(↑s : Set α) < ℵ₀ := lt_aleph0_of_finite _ theorem mk_set_eq_nat_iff_finset {α} {s : Set α} {n : ℕ} : #s = n ↔ ∃ t : Finset α, (t : Set α) = s ∧ t.card = n := by constructor · intro h lift s to Finset α using lt_aleph0_iff_set_finite.1 (h.symm ▸ nat_lt_aleph0 n) simpa using h · rintro ⟨t, rfl, rfl⟩ exact mk_coe_finset theorem mk_eq_nat_iff_finset {n : ℕ} : #α = n ↔ ∃ t : Finset α, (t : Set α) = univ ∧ t.card = n := by rw [← mk_univ, mk_set_eq_nat_iff_finset] theorem mk_eq_nat_iff_fintype {n : ℕ} : #α = n ↔ ∃ h : Fintype α, @Fintype.card α h = n := by rw [mk_eq_nat_iff_finset] constructor · rintro ⟨t, ht, hn⟩ exact ⟨⟨t, eq_univ_iff_forall.1 ht⟩, hn⟩ · rintro ⟨⟨t, ht⟩, hn⟩ exact ⟨t, eq_univ_iff_forall.2 ht, hn⟩ theorem mk_union_add_mk_inter {α : Type u} {S T : Set α} : #(S ∪ T : Set α) + #(S ∩ T : Set α) = #S + #T := by classical exact Quot.sound ⟨Equiv.Set.unionSumInter S T⟩ /-- The cardinality of a union is at most the sum of the cardinalities of the two sets. -/ theorem mk_union_le {α : Type u} (S T : Set α) : #(S ∪ T : Set α) ≤ #S + #T := @mk_union_add_mk_inter α S T ▸ self_le_add_right #(S ∪ T : Set α) #(S ∩ T : Set α) theorem mk_union_of_disjoint {α : Type u} {S T : Set α} (H : Disjoint S T) : #(S ∪ T : Set α) = #S + #T := by classical exact Quot.sound ⟨Equiv.Set.union H⟩ theorem mk_insert {α : Type u} {s : Set α} {a : α} (h : a ∉ s) : #(insert a s : Set α) = #s + 1 := by rw [← union_singleton, mk_union_of_disjoint, mk_singleton] simpa theorem mk_insert_le {α : Type u} {s : Set α} {a : α} : #(insert a s : Set α) ≤ #s + 1 := by by_cases h : a ∈ s · simp only [insert_eq_of_mem h, self_le_add_right] · rw [mk_insert h] theorem mk_sum_compl {α} (s : Set α) : #s + #(sᶜ : Set α) = #α := by classical exact mk_congr (Equiv.Set.sumCompl s) theorem mk_le_mk_of_subset {α} {s t : Set α} (h : s ⊆ t) : #s ≤ #t := ⟨Set.embeddingOfSubset s t h⟩ theorem mk_le_iff_forall_finset_subset_card_le {α : Type u} {n : ℕ} {t : Set α} : #t ≤ n ↔ ∀ s : Finset α, (s : Set α) ⊆ t → s.card ≤ n := by refine ⟨fun H s hs ↦ by simpa using (mk_le_mk_of_subset hs).trans H, fun H ↦ ?_⟩ apply card_le_of (fun s ↦ ?_) classical let u : Finset α := s.image Subtype.val have : u.card = s.card := Finset.card_image_of_injOn Subtype.coe_injective.injOn rw [← this] apply H simp only [u, Finset.coe_image, image_subset_iff, Subtype.coe_preimage_self, subset_univ] theorem mk_subtype_mono {p q : α → Prop} (h : ∀ x, p x → q x) : #{ x // p x } ≤ #{ x // q x } := ⟨embeddingOfSubset _ _ h⟩ theorem le_mk_diff_add_mk (S T : Set α) : #S ≤ #(S \ T : Set α) + #T := (mk_le_mk_of_subset <\| subset_diff_union _ _).trans <\| mk_union_le _ _ theorem mk_diff_add_mk {S T : Set α} (h : T ⊆ S) : #(S \ T : Set α) + #T = #S := by refine (mk_union_of_disjoint <\| ?_).symm.trans <\| by rw [diff_union_of_subset h] exact disjoint_sdiff_self_left theorem mk_union_le_aleph0 {α} {P Q : Set α} : #(P ∪ Q : Set α) ≤ ℵ₀ ↔ #P ≤ ℵ₀ ∧ #Q ≤ ℵ₀ := by simp only [le_aleph0_iff_subtype_countable, mem_union, setOf_mem_eq, Set.union_def, ← countable_union] theorem mk_sep (s : Set α) (t : α → Prop) : #({ x ∈ s \| t x } : Set α) = #{ x : s \| t x.1 } := mk_congr (Equiv.Set.sep s t) theorem mk_preimage_of_injective_lift {α : Type u} {β : Type v} (f : α → β) (s : Set β) (h : Injective f) : lift.{v} #(f ⁻¹' s) ≤ lift.{u} #s := by rw [lift_mk_le.{0}] -- Porting note: Needed to insert `mem_preimage.mp` below use Subtype.coind (fun x => f x.1) fun x => mem_preimage.mp x.2 apply Subtype.coind_injective; exact h.comp Subtype.val_injective theorem mk_preimage_of_subset_range_lift {α : Type u} {β : Type v} (f : α → β) (s : Set β) (h : s ⊆ range f) : lift.{u} #s ≤ lift.{v} #(f ⁻¹' s) := by rw [← image_preimage_eq_iff] at h nth_rewrite 1 [← h] apply mk_image_le_lift theorem mk_preimage_of_injective_of_subset_range_lift {β : Type v} (f : α → β) (s : Set β) (h : Injective f) (h2 : s ⊆ range f) : lift.{v} #(f ⁻¹' s) = lift.{u} #s := le_antisymm (mk_preimage_of_injective_lift f s h) (mk_preimage_of_subset_range_lift f s h2) theorem mk_preimage_of_injective_of_subset_range (f : α → β) (s : Set β) (h : Injective f) (h2 : s ⊆ range f) : #(f ⁻¹' s) = #s := by convert mk_preimage_of_injective_of_subset_range_lift.{u, u} f s h h2 using 1 <;> rw [lift_id] @[simp] theorem mk_preimage_equiv_lift {β : Type v} (f : α ≃ β) (s : Set β) : lift.{v} #(f ⁻¹' s) = lift.{u} #s := by apply mk_preimage_of_injective_of_subset_range_lift _ _ f.injective rw [f.range_eq_univ] exact fun _ _ ↦ ⟨⟩ @[simp] theorem mk_preimage_equiv (f : α ≃ β) (s : Set β) : #(f ⁻¹' s) = #s := by simpa using mk_preimage_equiv_lift f s theorem mk_preimage_of_injective (f : α → β) (s : Set β) (h : Injective f) : #(f ⁻¹' s) ≤ #s := by rw [← lift_id #(↑(f ⁻¹' s)), ← lift_id #(↑s)] exact mk_preimage_of_injective_lift f s h theorem mk_preimage_of_subset_range (f : α → β) (s : Set β) (h : s ⊆ range f) : #s ≤ #(f ⁻¹' s) := by rw [← lift_id #(↑(f ⁻¹' s)), ← lift_id #(↑s)] exact mk_preimage_of_subset_range_lift f s h theorem mk_subset_ge_of_subset_image_lift {α : Type u} {β : Type v} (f : α → β) {s : Set α} {t : Set β} (h : t ⊆ f '' s) : lift.{u} #t ≤ lift.{v} #({ x ∈ s \| f x ∈ t } : Set α) := by rw [image_eq_range] at h convert mk_preimage_of_subset_range_lift _ _ h using 1 rw [mk_sep] rfl theorem mk_subset_ge_of_subset_image (f : α → β) {s : Set α} {t : Set β} (h : t ⊆ f '' s) : #t ≤ #({ x ∈ s \| f x ∈ t } : Set α) := by rw [image_eq_range] at h convert mk_preimage_of_subset_range _ _ h using 1 rw [mk_sep] rfl theorem le_mk_iff_exists_subset {c : Cardinal} {α : Type u} {s : Set α} : c ≤ #s ↔ ∃ p : Set α, p ⊆ s ∧ #p = c := by rw [le_mk_iff_exists_set, ← Subtype.exists_set_subtype] apply exists_congr; intro t; rw [mk_image_eq]; apply Subtype.val_injective @[simp] theorem mk_range_inl {α : Type u} {β : Type v} : #(range (@Sum.inl α β)) = lift.{v} #α := by rw [← lift_id'.{u, v} #_, (Equiv.Set.rangeInl α β).lift_cardinal_eq, lift_umax.{u, v}] @[simp] theorem mk_range_inr {α : Type u} {β : Type v} : #(range (@Sum.inr α β)) = lift.{u} #β := by rw [← lift_id'.{v, u} #_, (Equiv.Set.rangeInr α β).lift_cardinal_eq, lift_umax.{v, u}] theorem two_le_iff : (2 : Cardinal) ≤ #α ↔ ∃ x y : α, x ≠ y := by rw [← Nat.cast_two, nat_succ, succ_le_iff, Nat.cast_one, one_lt_iff_nontrivial, nontrivial_iff] theorem two_le_iff' (x : α) : (2 : Cardinal) ≤ #α ↔ ∃ y : α, y ≠ x := by rw [two_le_iff, ← nontrivial_iff, nontrivial_iff_exists_ne x] theorem mk_eq_two_iff : #α = 2 ↔ ∃ x y : α, x ≠ y ∧ ({x, y} : Set α) = univ := by classical simp only [← @Nat.cast_two Cardinal, mk_eq_nat_iff_finset, Finset.card_eq_two] constructor · rintro ⟨t, ht, x, y, hne, rfl⟩ exact ⟨x, y, hne, by simpa using ht⟩ · rintro ⟨x, y, hne, h⟩ exact ⟨{x, y}, by simpa using h, x, y, hne, rfl⟩ theorem mk_eq_two_iff' (x : α) : #α = 2 ↔ ∃! y, y ≠ x := by rw [mk_eq_two_iff]; constructor · rintro ⟨a, b, hne, h⟩ simp only [eq_univ_iff_forall, mem_insert_iff, mem_singleton_iff] at h rcases h x with (rfl \| rfl) exacts [⟨b, hne.symm, fun z => (h z).resolve_left⟩, ⟨a, hne, fun z => (h z).resolve_right⟩] · rintro ⟨y, hne, hy⟩ exact ⟨x, y, hne.symm, eq_univ_of_forall fun z => or_iff_not_imp_left.2 (hy z)⟩ theorem exists_not_mem_of_length_lt {α : Type} (l : List α) (h : ↑l.length < #α) : ∃ z : α, z ∉ l := by classical contrapose! h calc #α = #(Set.univ : Set α) := mk_univ.symm _ ≤ #l.toFinset := mk_le_mk_of_subset fun x _ => List.mem_toFinset.mpr (h x) _ = l.toFinset.card := Cardinal.mk_coe_finset _ ≤ l.length := Nat.cast_le.mpr (List.toFinset_card_le l) theorem three_le {α : Type} (h : 3 ≤ #α) (x : α) (y : α) : ∃ z : α, z ≠ x ∧ z ≠ y := by have : ↑(3 : ℕ) ≤ #α := by simpa using h have : ↑(2 : ℕ) < #α := by rwa [← succ_le_iff, ← Cardinal.nat_succ] have := exists_not_mem_of_length_lt [x, y] this simpa [not_or] using this /-! ### `powerlt` operation -/ /-- The function `a ^< b`, defined as the supremum of `a ^ c` for `c < b`. -/ def powerlt (a b : Cardinal.{u}) : Cardinal.{u} := ⨆ c : Iio b, a ^ (c : Cardinal) @[inherit_doc] infixl:80 " ^< " => powerlt theorem le_powerlt {b c : Cardinal.{u}} (a) (h : c < b) : (a^c) ≤ a ^< b := by refine le_ciSup (f := fun y : Iio b => a ^ (y : Cardinal)) ?_ ⟨c, h⟩ rw [← image_eq_range] exact bddAbove_image.{u, u} _ bddAbove_Iio theorem powerlt_le {a b c : Cardinal.{u}} : a ^< b ≤ c ↔ ∀ x < b, a ^ x ≤ c := by rw [powerlt, ciSup_le_iff'] · simp · rw [← image_eq_range] exact bddAbove_image.{u, u} _ bddAbove_Iio theorem powerlt_le_powerlt_left {a b c : Cardinal} (h : b ≤ c) : a ^< b ≤ a ^< c := powerlt_le.2 fun _ hx => le_powerlt a <\| hx.trans_le h theorem powerlt_mono_left (a) : Monotone fun c => a ^< c := fun _ _ => powerlt_le_powerlt_left theorem powerlt_succ {a b : Cardinal} (h : a ≠ 0) : a ^< succ b = a ^ b := (powerlt_le.2 fun _ h' => power_le_power_left h <\| le_of_lt_succ h').antisymm <\| le_powerlt a (lt_succ b) theorem powerlt_min {a b c : Cardinal} : a ^< min b c = min (a ^< b) (a ^< c) := (powerlt_mono_left a).map_min theorem powerlt_max {a b c : Cardinal} : a ^< max b c = max (a ^< b) (a ^< c) := (powerlt_mono_left a).map_max theorem zero_powerlt {a : Cardinal} (h : a ≠ 0) : 0 ^< a = 1 := by apply (powerlt_le.2 fun c _ => zero_power_le _).antisymm rw [← power_zero] exact le_powerlt 0 (pos_iff_ne_zero.2 h) @[simp] theorem powerlt_zero {a : Cardinal} : a ^< 0 = 0 := by convert Cardinal.iSup_of_empty _ exact Subtype.isEmpty_of_false fun x => mem_Iio.not.mpr (Cardinal.zero_le x).not_lt end Cardinal		Mathlib/SetTheory/Cardinal/Basic.lean	1,307	1,307
/- Copyright (c) 2022 Praneeth Kolichala. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Praneeth Kolichala -/ import Mathlib.Data.Nat.Basic import Mathlib.Data.Nat.BinaryRec import Mathlib.Data.List.Defs import Mathlib.Tactic.Convert import Mathlib.Tactic.GeneralizeProofs import Mathlib.Tactic.Says /-! # Additional properties of binary recursion on `Nat` This file documents additional properties of binary recursion, which allows us to more easily work with operations which do depend on the number of leading zeros in the binary representation of `n`. For example, we can more easily work with `Nat.bits` and `Nat.size`. See also: `Nat.bitwise`, `Nat.pow` (for various lemmas about `size` and `shiftLeft`/`shiftRight`), and `Nat.digits`. -/ assert_not_exists Monoid -- Once we're in the `Nat` namespace, `xor` will inconveniently resolve to `Nat.xor`. /-- `bxor` denotes the `xor` function i.e. the exclusive-or function on type `Bool`. -/ local notation "bxor" => xor namespace Nat universe u variable {m n : ℕ} /-- `boddDiv2 n` returns a 2-tuple of type `(Bool, Nat)` where the `Bool` value indicates whether `n` is odd or not and the `Nat` value returns `⌊n/2⌋` -/ def boddDiv2 : ℕ → Bool × ℕ \| 0 => (false, 0) \| succ n => match boddDiv2 n with \| (false, m) => (true, m) \| (true, m) => (false, succ m) /-- `div2 n = ⌊n/2⌋` the greatest integer smaller than `n/2` -/ def div2 (n : ℕ) : ℕ := (boddDiv2 n).2 /-- `bodd n` returns `true` if `n` is odd -/ def bodd (n : ℕ) : Bool := (boddDiv2 n).1 @[simp] lemma bodd_zero : bodd 0 = false := rfl @[simp] lemma bodd_one : bodd 1 = true := rfl lemma bodd_two : bodd 2 = false := rfl @[simp] lemma bodd_succ (n : ℕ) : bodd (succ n) = not (bodd n) := by simp only [bodd, boddDiv2] let ⟨b,m⟩ := boddDiv2 n cases b <;> rfl @[simp] lemma bodd_add (m n : ℕ) : bodd (m + n) = bxor (bodd m) (bodd n) := by induction n case zero => simp case succ n ih => simp [← Nat.add_assoc, Bool.xor_not, ih] @[simp] lemma bodd_mul (m n : ℕ) : bodd (m * n) = (bodd m && bodd n) := by induction n with \| zero => simp \| succ n IH => simp only [mul_succ, bodd_add, IH, bodd_succ] cases bodd m <;> cases bodd n <;> rfl lemma mod_two_of_bodd (n : ℕ) : n % 2 = (bodd n).toNat := by have := congr_arg bodd (mod_add_div n 2) simp? [not] at this says simp only [bodd_add, bodd_mul, bodd_succ, not, bodd_zero, Bool.false_and, Bool.bne_false] at this have _ : ∀ b, and false b = false := by intro b cases b <;> rfl have _ : ∀ b, bxor b false = b := by intro b cases b <;> rfl rw [← this] rcases mod_two_eq_zero_or_one n with h \| h <;> rw [h] <;> rfl @[simp] lemma div2_zero : div2 0 = 0 := rfl @[simp] lemma div2_one : div2 1 = 0 := rfl lemma div2_two : div2 2 = 1 := rfl @[simp] lemma div2_succ (n : ℕ) : div2 (n + 1) = cond (bodd n) (succ (div2 n)) (div2 n) := by simp only [bodd, boddDiv2, div2] rcases boddDiv2 n with ⟨_\|_, _⟩ <;> simp attribute [local simp] Nat.add_comm Nat.add_assoc Nat.add_left_comm Nat.mul_comm Nat.mul_assoc lemma bodd_add_div2 : ∀ n, (bodd n).toNat + 2 * div2 n = n \| 0 => rfl \| succ n => by simp only [bodd_succ, Bool.cond_not, div2_succ, Nat.mul_comm] refine Eq.trans ?_ (congr_arg succ (bodd_add_div2 n)) cases bodd n · simp · simp; omega lemma div2_val (n) : div2 n = n / 2 := by refine Nat.eq_of_mul_eq_mul_left (by decide) (Nat.add_left_cancel (Eq.trans ?_ (Nat.mod_add_div n 2).symm)) rw [mod_two_of_bodd, bodd_add_div2] lemma bit_decomp (n : Nat) : bit (bodd n) (div2 n) = n := (bit_val _ _).trans <\| (Nat.add_comm _ _).trans <\| bodd_add_div2 _ lemma bit_zero : bit false 0 = 0 := rfl /-- `shiftLeft' b m n` performs a left shift of `m` `n` times and adds the bit `b` as the least significant bit each time. Returns the corresponding natural number -/ def shiftLeft' (b : Bool) (m : ℕ) : ℕ → ℕ \| 0 => m \| n + 1 => bit b (shiftLeft' b m n) @[simp] lemma shiftLeft'_false : ∀ n, shiftLeft' false m n = m <<< n \| 0 => rfl \| n + 1 => by have : 2 * (m * 2^n) = 2^(n+1)m := by rw [Nat.mul_comm, Nat.mul_assoc, ← Nat.pow_succ]; simp simp [shiftLeft_eq, shiftLeft', bit_val, shiftLeft'_false, this] /-- Lean takes the unprimed name for `Nat.shiftLeft_eq m n : m <<< n = m 2 ^ n`. -/ @[simp] lemma shiftLeft_eq' (m n : Nat) : shiftLeft m n = m <<< n := rfl @[simp] lemma shiftRight_eq (m n : Nat) : shiftRight m n = m >>> n := rfl lemma binaryRec_decreasing (h : n ≠ 0) : div2 n < n := by rw [div2_val] apply (div_lt_iff_lt_mul <\| succ_pos 1).2 have := Nat.mul_lt_mul_of_pos_left (lt_succ_self 1) (lt_of_le_of_ne n.zero_le h.symm) rwa [Nat.mul_one] at this /-- `size n` : Returns the size of a natural number in bits i.e. the length of its binary representation -/ def size : ℕ → ℕ := binaryRec 0 fun _ _ => succ /-- `bits n` returns a list of Bools which correspond to the binary representation of n, where the head of the list represents the least significant bit -/ def bits : ℕ → List Bool := binaryRec [] fun b _ IH => b :: IH /-- `ldiff a b` performs bitwise set difference. For each corresponding pair of bits taken as booleans, say `aᵢ` and `bᵢ`, it applies the boolean operation `aᵢ ∧ ¬bᵢ` to obtain the `iᵗʰ` bit of the result. -/ def ldiff : ℕ → ℕ → ℕ := bitwise fun a b => a && not b /-! bitwise ops -/ lemma bodd_bit (b n) : bodd (bit b n) = b := by rw [bit_val] simp only [Nat.mul_comm, Nat.add_comm, bodd_add, bodd_mul, bodd_succ, bodd_zero, Bool.not_false, Bool.not_true, Bool.and_false, Bool.xor_false] cases b <;> cases bodd n <;> rfl lemma div2_bit (b n) : div2 (bit b n) = n := by rw [bit_val, div2_val, Nat.add_comm, add_mul_div_left, div_eq_of_lt, Nat.zero_add] <;> cases b <;> decide lemma shiftLeft'_add (b m n) : ∀ k, shiftLeft' b m (n + k) = shiftLeft' b (shiftLeft' b m n) k \| 0 => rfl \| k + 1 => congr_arg (bit b) (shiftLeft'_add b m n k) lemma shiftLeft'_sub (b m) : ∀ {n k}, k ≤ n → shiftLeft' b m (n - k) = (shiftLeft' b m n) >>> k \| _, 0, _ => rfl \| n + 1, k + 1, h => by rw [succ_sub_succ_eq_sub, shiftLeft', Nat.add_comm, shiftRight_add] simp only [shiftLeft'_sub, Nat.le_of_succ_le_succ h, shiftRight_succ, shiftRight_zero] simp [← div2_val, div2_bit] lemma shiftLeft_sub : ∀ (m : Nat) {n k}, k ≤ n → m <<< (n - k) = (m <<< n) >>> k := fun _ _ _ hk => by simp only [← shiftLeft'_false, shiftLeft'_sub false _ hk] lemma bodd_eq_one_and_ne_zero : ∀ n, bodd n = (1 &&& n != 0) \| 0 => rfl \| 1 => rfl \| n + 2 => by simpa using bodd_eq_one_and_ne_zero n lemma testBit_bit_succ (m b n) : testBit (bit b n) (succ m) = testBit n m := by have : bodd (((bit b n) >>> 1) >>> m) = bodd (n >>> m) := by simp only [shiftRight_eq_div_pow] simp [← div2_val, div2_bit] rw [← shiftRight_add, Nat.add_comm] at this simp only [bodd_eq_one_and_ne_zero] at this exact this /-! ### `boddDiv2_eq` and `bodd` -/ @[simp] theorem boddDiv2_eq (n : ℕ) : boddDiv2 n = (bodd n, div2 n) := rfl @[simp] theorem div2_bit0 (n) : div2 (2 * n) = n := div2_bit false n -- simp can prove this theorem div2_bit1 (n) : div2 (2 * n + 1) = n := div2_bit true n /-! ### `bit0` and `bit1` -/ theorem bit_add : ∀ (b : Bool) (n m : ℕ), bit b (n + m) = bit false n + bit b m \| true, _, _ => by dsimp [bit]; omega \| false, _, _ => by dsimp [bit]; omega theorem bit_add' : ∀ (b : Bool) (n m : ℕ), bit b (n + m) = bit b n + bit false m \| true, _, _ => by dsimp [bit]; omega \| false, _, _ => by dsimp [bit]; omega theorem bit_ne_zero (b) {n} (h : n ≠ 0) : bit b n ≠ 0 := by cases b <;> dsimp [bit] <;> omega @[simp] theorem bitCasesOn_bit0 {motive : ℕ → Sort u} (H : ∀ b n, motive (bit b n)) (n : ℕ) : bitCasesOn (2 * n) H = H false n := bitCasesOn_bit H false n @[simp] theorem bitCasesOn_bit1 {motive : ℕ → Sort u} (H : ∀ b n, motive (bit b n)) (n : ℕ) : bitCasesOn (2 * n + 1) H = H true n := bitCasesOn_bit H true n theorem bit_cases_on_injective {motive : ℕ → Sort u} : Function.Injective fun H : ∀ b n, motive (bit b n) => fun n => bitCasesOn n H := by intro H₁ H₂ h ext b n simpa only [bitCasesOn_bit] using congr_fun h (bit b n) @[simp] theorem bit_cases_on_inj {motive : ℕ → Sort u} (H₁ H₂ : ∀ b n, motive (bit b n)) : ((fun n => bitCasesOn n H₁) = fun n => bitCasesOn n H₂) ↔ H₁ = H₂ := bit_cases_on_injective.eq_iff lemma bit_le : ∀ (b : Bool) {m n : ℕ}, m ≤ n → bit b m ≤ bit b n \| true, _, _, h => by dsimp [bit]; omega \| false, _, _, h => by dsimp [bit]; omega lemma bit_lt_bit (a b) (h : m < n) : bit a m < bit b n := calc bit a m < 2 * n := by cases a <;> dsimp [bit] <;> omega _ ≤ bit b n := by cases b <;> dsimp [bit] <;> omega @[simp] theorem zero_bits : bits 0 = [] := by simp [Nat.bits] @[simp] theorem bits_append_bit (n : ℕ) (b : Bool) (hn : n = 0 → b = true) : (bit b n).bits = b :: n.bits := by rw [Nat.bits, Nat.bits, binaryRec_eq] simpa @[simp] theorem bit0_bits (n : ℕ) (hn : n ≠ 0) : (2 * n).bits = false :: n.bits := bits_append_bit n false fun hn' => absurd hn' hn @[simp] theorem bit1_bits (n : ℕ) : (2 * n + 1).bits = true :: n.bits := bits_append_bit n true fun _ => rfl @[simp] theorem one_bits : Nat.bits 1 = [true] := by convert bit1_bits 0 simp	-- TODO Find somewhere this can live. -- example : bits 3423 = [true, true, true, true, true, false, true, false, true, false, true, true] -- := by norm_num	Mathlib/Data/Nat/Bits.lean	282	286
/- Copyright (c) 2014 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Mario Carneiro -/ import Mathlib.Data.Subtype import Mathlib.Order.Defs.LinearOrder import Mathlib.Order.Notation import Mathlib.Tactic.GCongr.Core import Mathlib.Tactic.Spread import Mathlib.Tactic.Convert import Mathlib.Tactic.Inhabit import Mathlib.Tactic.SimpRw /-! # Basic definitions about `≤` and `<` This file proves basic results about orders, provides extensive dot notation, defines useful order classes and allows to transfer order instances. ## Type synonyms * `OrderDual α` : A type synonym reversing the meaning of all inequalities, with notation `αᵒᵈ`. * `AsLinearOrder α`: A type synonym to promote `PartialOrder α` to `LinearOrder α` using `IsTotal α (≤)`. ### Transferring orders - `Order.Preimage`, `Preorder.lift`: Transfers a (pre)order on `β` to an order on `α` using a function `f : α → β`. - `PartialOrder.lift`, `LinearOrder.lift`: Transfers a partial (resp., linear) order on `β` to a partial (resp., linear) order on `α` using an injective function `f`. ### Extra class * `DenselyOrdered`: An order with no gap, i.e. for any two elements `a < b` there exists `c` such that `a < c < b`. ## Notes `≤` and `<` are highly favored over `≥` and `>` in mathlib. The reason is that we can formulate all lemmas using `≤`/`<`, and `rw` has trouble unifying `≤` and `≥`. Hence choosing one direction spares us useless duplication. This is enforced by a linter. See Note [nolint_ge] for more infos. Dot notation is particularly useful on `≤` (`LE.le`) and `<` (`LT.lt`). To that end, we provide many aliases to dot notation-less lemmas. For example, `le_trans` is aliased with `LE.le.trans` and can be used to construct `hab.trans hbc : a ≤ c` when `hab : a ≤ b`, `hbc : b ≤ c`, `lt_of_le_of_lt` is aliased as `LE.le.trans_lt` and can be used to construct `hab.trans hbc : a < c` when `hab : a ≤ b`, `hbc : b < c`. ## TODO - expand module docs - automatic construction of dual definitions / theorems ## Tags preorder, order, partial order, poset, linear order, chain -/ open Function variable {ι α β : Type} {π : ι → Type} /-! ### Bare relations -/ attribute [ext] LE protected lemma LE.le.ge [LE α] {x y : α} (h : x ≤ y) : y ≥ x := h protected lemma GE.ge.le [LE α] {x y : α} (h : x ≥ y) : y ≤ x := h protected lemma LT.lt.gt [LT α] {x y : α} (h : x < y) : y > x := h protected lemma GT.gt.lt [LT α] {x y : α} (h : x > y) : y < x := h /-- Given a relation `R` on `β` and a function `f : α → β`, the preimage relation on `α` is defined by `x ≤ y ↔ f x ≤ f y`. It is the unique relation on `α` making `f` a `RelEmbedding` (assuming `f` is injective). -/ @[simp] def Order.Preimage (f : α → β) (s : β → β → Prop) (x y : α) : Prop := s (f x) (f y) @[inherit_doc] infixl:80 " ⁻¹'o " => Order.Preimage /-- The preimage of a decidable order is decidable. -/ instance Order.Preimage.decidable (f : α → β) (s : β → β → Prop) [H : DecidableRel s] : DecidableRel (f ⁻¹'o s) := fun _ _ ↦ H _ _ /-! ### Preorders -/ section Preorder variable [Preorder α] {a b c d : α} theorem le_trans' : b ≤ c → a ≤ b → a ≤ c := flip le_trans theorem lt_trans' : b < c → a < b → a < c := flip lt_trans theorem lt_of_le_of_lt' : b ≤ c → a < b → a < c := flip lt_of_lt_of_le theorem lt_of_lt_of_le' : b < c → a ≤ b → a < c := flip lt_of_le_of_lt theorem le_of_le_of_eq' : b ≤ c → a = b → a ≤ c := flip le_of_eq_of_le theorem le_of_eq_of_le' : b = c → a ≤ b → a ≤ c := flip le_of_le_of_eq theorem lt_of_lt_of_eq' : b < c → a = b → a < c := flip lt_of_eq_of_lt theorem lt_of_eq_of_lt' : b = c → a < b → a < c := flip lt_of_lt_of_eq theorem not_lt_iff_not_le_or_ge : ¬a < b ↔ ¬a ≤ b ∨ b ≤ a := by rw [lt_iff_le_not_le, Classical.not_and_iff_not_or_not, Classical.not_not] -- Unnecessary brackets are here for readability lemma not_lt_iff_le_imp_le : ¬ a < b ↔ (a ≤ b → b ≤ a) := by simp [not_lt_iff_not_le_or_ge, or_iff_not_imp_left] /-- If `x = y` then `y ≤ x`. Note: this lemma uses `y ≤ x` instead of `x ≥ y`, because `le` is used almost exclusively in mathlib. -/ lemma ge_of_eq (h : a = b) : b ≤ a := le_of_eq h.symm @[simp] lemma lt_self_iff_false (x : α) : x < x ↔ False := ⟨lt_irrefl x, False.elim⟩ alias LE.le.trans := le_trans alias LE.le.trans' := le_trans' alias LT.lt.trans := lt_trans alias LT.lt.trans' := lt_trans' alias LE.le.trans_lt := lt_of_le_of_lt alias LE.le.trans_lt' := lt_of_le_of_lt' alias LT.lt.trans_le := lt_of_lt_of_le alias LT.lt.trans_le' := lt_of_lt_of_le' alias LE.le.trans_eq := le_of_le_of_eq alias LE.le.trans_eq' := le_of_le_of_eq' alias LT.lt.trans_eq := lt_of_lt_of_eq alias LT.lt.trans_eq' := lt_of_lt_of_eq' alias Eq.trans_le := le_of_eq_of_le alias Eq.trans_ge := le_of_eq_of_le' alias Eq.trans_lt := lt_of_eq_of_lt alias Eq.trans_gt := lt_of_eq_of_lt' alias LE.le.lt_of_not_le := lt_of_le_not_le alias LE.le.lt_or_eq_dec := Decidable.lt_or_eq_of_le alias LT.lt.le := le_of_lt alias LT.lt.ne := ne_of_lt alias Eq.le := le_of_eq @[inherit_doc ge_of_eq] alias Eq.ge := ge_of_eq alias LT.lt.asymm := lt_asymm alias LT.lt.not_lt := lt_asymm theorem ne_of_not_le (h : ¬a ≤ b) : a ≠ b := fun hab ↦ h (le_of_eq hab) protected lemma Eq.not_lt (hab : a = b) : ¬a < b := fun h' ↦ h'.ne hab protected lemma Eq.not_gt (hab : a = b) : ¬b < a := hab.symm.not_lt @[simp] lemma le_of_subsingleton [Subsingleton α] : a ≤ b := (Subsingleton.elim a b).le -- Making this a @[simp] lemma causes confluence problems downstream. lemma not_lt_of_subsingleton [Subsingleton α] : ¬a < b := (Subsingleton.elim a b).not_lt namespace LT.lt protected theorem false : a < a → False := lt_irrefl a theorem ne' (h : a < b) : b ≠ a := h.ne.symm end LT.lt theorem le_of_forall_le (H : ∀ c, c ≤ a → c ≤ b) : a ≤ b := H _ le_rfl theorem le_of_forall_ge (H : ∀ c, a ≤ c → b ≤ c) : b ≤ a := H _ le_rfl @[deprecated (since := "2025-01-30")] alias le_of_forall_le' := le_of_forall_ge theorem forall_le_iff_le : (∀ ⦃c⦄, c ≤ a → c ≤ b) ↔ a ≤ b := ⟨le_of_forall_le, fun h _ hca ↦ le_trans hca h⟩ theorem forall_le_iff_ge : (∀ ⦃c⦄, a ≤ c → b ≤ c) ↔ b ≤ a := ⟨le_of_forall_ge, fun h _ hca ↦ le_trans h hca⟩ /-- monotonicity of `≤` with respect to `→` -/ theorem le_implies_le_of_le_of_le (hca : c ≤ a) (hbd : b ≤ d) : a ≤ b → c ≤ d := fun hab ↦ (hca.trans hab).trans hbd end Preorder /-! ### Partial order -/ section PartialOrder variable [PartialOrder α] {a b : α} theorem ge_antisymm : a ≤ b → b ≤ a → b = a := flip le_antisymm theorem lt_of_le_of_ne' : a ≤ b → b ≠ a → a < b := fun h₁ h₂ ↦ lt_of_le_of_ne h₁ h₂.symm theorem Ne.lt_of_le : a ≠ b → a ≤ b → a < b := flip lt_of_le_of_ne theorem Ne.lt_of_le' : b ≠ a → a ≤ b → a < b := flip lt_of_le_of_ne' alias LE.le.antisymm := le_antisymm alias LE.le.antisymm' := ge_antisymm alias LE.le.lt_of_ne := lt_of_le_of_ne alias LE.le.lt_of_ne' := lt_of_le_of_ne' alias LE.le.lt_or_eq := lt_or_eq_of_le -- Unnecessary brackets are here for readability lemma le_imp_eq_iff_le_imp_le : (a ≤ b → b = a) ↔ (a ≤ b → b ≤ a) where mp h hab := (h hab).le mpr h hab := (h hab).antisymm hab -- Unnecessary brackets are here for readability lemma ge_imp_eq_iff_le_imp_le : (a ≤ b → a = b) ↔ (a ≤ b → b ≤ a) where mp h hab := (h hab).ge mpr h hab := hab.antisymm (h hab) namespace LE.le theorem lt_iff_ne (h : a ≤ b) : a < b ↔ a ≠ b := ⟨fun h ↦ h.ne, h.lt_of_ne⟩ theorem gt_iff_ne (h : a ≤ b) : a < b ↔ b ≠ a := ⟨fun h ↦ h.ne.symm, h.lt_of_ne'⟩ theorem not_lt_iff_eq (h : a ≤ b) : ¬a < b ↔ a = b := h.lt_iff_ne.not_left theorem not_gt_iff_eq (h : a ≤ b) : ¬a < b ↔ b = a := h.gt_iff_ne.not_left theorem le_iff_eq (h : a ≤ b) : b ≤ a ↔ b = a := ⟨fun h' ↦ h'.antisymm h, Eq.le⟩ theorem ge_iff_eq (h : a ≤ b) : b ≤ a ↔ a = b := ⟨h.antisymm, Eq.ge⟩ end LE.le -- See Note [decidable namespace] protected theorem Decidable.le_iff_eq_or_lt [DecidableLE α] : a ≤ b ↔ a = b ∨ a < b := Decidable.le_iff_lt_or_eq.trans or_comm theorem le_iff_eq_or_lt : a ≤ b ↔ a = b ∨ a < b := le_iff_lt_or_eq.trans or_comm theorem lt_iff_le_and_ne : a < b ↔ a ≤ b ∧ a ≠ b := ⟨fun h ↦ ⟨le_of_lt h, ne_of_lt h⟩, fun ⟨h1, h2⟩ ↦ h1.lt_of_ne h2⟩ lemma eq_iff_not_lt_of_le (hab : a ≤ b) : a = b ↔ ¬ a < b := by simp [hab, lt_iff_le_and_ne] alias LE.le.eq_iff_not_lt := eq_iff_not_lt_of_le -- See Note [decidable namespace] protected theorem Decidable.eq_iff_le_not_lt [DecidableLE α] : a = b ↔ a ≤ b ∧ ¬a < b := ⟨fun h ↦ ⟨h.le, h ▸ lt_irrefl _⟩, fun ⟨h₁, h₂⟩ ↦ h₁.antisymm <\| Decidable.byContradiction fun h₃ ↦ h₂ (h₁.lt_of_not_le h₃)⟩ theorem eq_iff_le_not_lt : a = b ↔ a ≤ b ∧ ¬a < b := haveI := Classical.dec Decidable.eq_iff_le_not_lt theorem eq_or_lt_of_le (h : a ≤ b) : a = b ∨ a < b := h.lt_or_eq.symm theorem eq_or_gt_of_le (h : a ≤ b) : b = a ∨ a < b := h.lt_or_eq.symm.imp Eq.symm id theorem gt_or_eq_of_le (h : a ≤ b) : a < b ∨ b = a := (eq_or_gt_of_le h).symm alias LE.le.eq_or_lt_dec := Decidable.eq_or_lt_of_le alias LE.le.eq_or_lt := eq_or_lt_of_le alias LE.le.eq_or_gt := eq_or_gt_of_le alias LE.le.gt_or_eq := gt_or_eq_of_le theorem eq_of_le_of_not_lt (hab : a ≤ b) (hba : ¬a < b) : a = b := hab.eq_or_lt.resolve_right hba theorem eq_of_ge_of_not_gt (hab : a ≤ b) (hba : ¬a < b) : b = a := (eq_of_le_of_not_lt hab hba).symm alias LE.le.eq_of_not_lt := eq_of_le_of_not_lt alias LE.le.eq_of_not_gt := eq_of_ge_of_not_gt theorem Ne.le_iff_lt (h : a ≠ b) : a ≤ b ↔ a < b := ⟨fun h' ↦ lt_of_le_of_ne h' h, fun h ↦ h.le⟩ theorem Ne.not_le_or_not_le (h : a ≠ b) : ¬a ≤ b ∨ ¬b ≤ a := not_and_or.1 <\| le_antisymm_iff.not.1 h -- See Note [decidable namespace] protected theorem Decidable.ne_iff_lt_iff_le [DecidableEq α] : (a ≠ b ↔ a < b) ↔ a ≤ b := ⟨fun h ↦ Decidable.byCases le_of_eq (le_of_lt ∘ h.mp), fun h ↦ ⟨lt_of_le_of_ne h, ne_of_lt⟩⟩ @[simp] theorem ne_iff_lt_iff_le : (a ≠ b ↔ a < b) ↔ a ≤ b := haveI := Classical.dec Decidable.ne_iff_lt_iff_le lemma eq_of_forall_le_iff (H : ∀ c, c ≤ a ↔ c ≤ b) : a = b := ((H _).1 le_rfl).antisymm ((H _).2 le_rfl) lemma eq_of_forall_ge_iff (H : ∀ c, a ≤ c ↔ b ≤ c) : a = b := ((H _).2 le_rfl).antisymm ((H _).1 le_rfl) /-- To prove commutativity of a binary operation `○`, we only to check `a ○ b ≤ b ○ a` for all `a`, `b`. -/ lemma commutative_of_le {f : β → β → α} (comm : ∀ a b, f a b ≤ f b a) : ∀ a b, f a b = f b a := fun _ _ ↦ (comm _ _).antisymm <\| comm _ _ /-- To prove associativity of a commutative binary operation `○`, we only to check `(a ○ b) ○ c ≤ a ○ (b ○ c)` for all `a`, `b`, `c`. -/ lemma associative_of_commutative_of_le {f : α → α → α} (comm : Std.Commutative f) (assoc : ∀ a b c, f (f a b) c ≤ f a (f b c)) : Std.Associative f where assoc a b c := le_antisymm (assoc _ _ _) <\| by rw [comm.comm, comm.comm b, comm.comm _ c, comm.comm a] exact assoc .. end PartialOrder section LinearOrder variable [LinearOrder α] {a b : α} namespace LE.le lemma lt_or_le (h : a ≤ b) (c : α) : a < c ∨ c ≤ b := (lt_or_ge a c).imp id h.trans' lemma le_or_lt (h : a ≤ b) (c : α) : a ≤ c ∨ c < b := (le_or_gt a c).imp id h.trans_lt' lemma le_or_le (h : a ≤ b) (c : α) : a ≤ c ∨ c ≤ b := (h.lt_or_le c).imp le_of_lt id end LE.le namespace LT.lt lemma lt_or_lt (h : a < b) (c : α) : a < c ∨ c < b := (le_or_gt b c).imp h.trans_le id end LT.lt -- Variant of `min_def` with the branches reversed. theorem min_def' (a b : α) : min a b = if b ≤ a then b else a := by rw [min_def] rcases lt_trichotomy a b with (lt \| eq \| gt) · rw [if_pos lt.le, if_neg (not_le.mpr lt)] · rw [if_pos eq.le, if_pos eq.ge, eq] · rw [if_neg (not_le.mpr gt.gt), if_pos gt.le] -- Variant of `min_def` with the branches reversed. -- This is sometimes useful as it used to be the default. theorem max_def' (a b : α) : max a b = if b ≤ a then a else b := by rw [max_def] rcases lt_trichotomy a b with (lt \| eq \| gt) · rw [if_pos lt.le, if_neg (not_le.mpr lt)] · rw [if_pos eq.le, if_pos eq.ge, eq] · rw [if_neg (not_le.mpr gt.gt), if_pos gt.le] theorem lt_of_not_le (h : ¬b ≤ a) : a < b := ((le_total _ _).resolve_right h).lt_of_not_le h theorem lt_iff_not_le : a < b ↔ ¬b ≤ a := ⟨not_le_of_lt, lt_of_not_le⟩ theorem Ne.lt_or_lt (h : a ≠ b) : a < b ∨ b < a := lt_or_gt_of_ne h /-- A version of `ne_iff_lt_or_gt` with LHS and RHS reversed. -/ @[simp] theorem lt_or_lt_iff_ne : a < b ∨ b < a ↔ a ≠ b := ne_iff_lt_or_gt.symm	theorem not_lt_iff_eq_or_lt : ¬a < b ↔ a = b ∨ b < a := not_lt.trans <\| Decidable.le_iff_eq_or_lt.trans <\| or_congr eq_comm Iff.rfl	Mathlib/Order/Basic.lean	365	366
/- 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. -/	Mathlib/Topology/UniformSpace/UniformConvergence.lean	147	148
/- Copyright (c) 2022 Yakov Pechersky. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yakov Pechersky -/ import Mathlib.Data.List.Induction import Mathlib.Data.List.TakeWhile /-! # Dropping or taking from lists on the right Taking or removing element from the tail end of a list ## Main definitions - `rdrop n`: drop `n : ℕ` elements from the tail - `rtake n`: take `n : ℕ` elements from the tail - `rdropWhile p`: remove all the elements from the tail of a list until it finds the first element for which `p : α → Bool` returns false. This element and everything before is returned. - `rtakeWhile p`: Returns the longest terminal segment of a list for which `p : α → Bool` returns true. ## Implementation detail The two predicate-based methods operate by performing the regular "from-left" operation on `List.reverse`, followed by another `List.reverse`, so they are not the most performant. The other two rely on `List.length l` so they still traverse the list twice. One could construct another function that takes a `L : ℕ` and use `L - n`. Under a proof condition that `L = l.length`, the function would do the right thing. -/ -- Make sure we don't import algebra assert_not_exists Monoid variable {α : Type*} (p : α → Bool) (l : List α) (n : ℕ) namespace List /-- Drop `n` elements from the tail end of a list. -/ def rdrop : List α := l.take (l.length - n) @[simp] theorem rdrop_nil : rdrop ([] : List α) n = [] := by simp [rdrop] @[simp] theorem rdrop_zero : rdrop l 0 = l := by simp [rdrop] theorem rdrop_eq_reverse_drop_reverse : l.rdrop n = reverse (l.reverse.drop n) := by rw [rdrop] induction' l using List.reverseRecOn with xs x IH generalizing n · simp · cases n · simp [take_append] · simp [take_append_eq_append_take, IH] @[simp] theorem rdrop_concat_succ (x : α) : rdrop (l ++ [x]) (n + 1) = rdrop l n := by simp [rdrop_eq_reverse_drop_reverse] /-- Take `n` elements from the tail end of a list. -/ def rtake : List α := l.drop (l.length - n) @[simp] theorem rtake_nil : rtake ([] : List α) n = [] := by simp [rtake] @[simp] theorem rtake_zero : rtake l 0 = [] := by simp [rtake] theorem rtake_eq_reverse_take_reverse : l.rtake n = reverse (l.reverse.take n) := by rw [rtake] induction' l using List.reverseRecOn with xs x IH generalizing n · simp · cases n · exact drop_length · simp [drop_append_eq_append_drop, IH] @[simp] theorem rtake_concat_succ (x : α) : rtake (l ++ [x]) (n + 1) = rtake l n ++ [x] := by simp [rtake_eq_reverse_take_reverse] /-- Drop elements from the tail end of a list that satisfy `p : α → Bool`. Implemented naively via `List.reverse` -/ def rdropWhile : List α := reverse (l.reverse.dropWhile p) @[simp] theorem rdropWhile_nil : rdropWhile p ([] : List α) = [] := by simp [rdropWhile, dropWhile] theorem rdropWhile_concat (x : α) : rdropWhile p (l ++ [x]) = if p x then rdropWhile p l else l ++ [x] := by simp only [rdropWhile, dropWhile, reverse_append, reverse_singleton, singleton_append] split_ifs with h <;> simp [h] @[simp] theorem rdropWhile_concat_pos (x : α) (h : p x) : rdropWhile p (l ++ [x]) = rdropWhile p l := by rw [rdropWhile_concat, if_pos h] @[simp] theorem rdropWhile_concat_neg (x : α) (h : ¬p x) : rdropWhile p (l ++ [x]) = l ++ [x] := by rw [rdropWhile_concat, if_neg h] theorem rdropWhile_singleton (x : α) : rdropWhile p [x] = if p x then [] else [x] := by rw [← nil_append [x], rdropWhile_concat, rdropWhile_nil] theorem rdropWhile_last_not (hl : l.rdropWhile p ≠ []) : ¬p ((rdropWhile p l).getLast hl) := by simp_rw [rdropWhile] rw [getLast_reverse, head_dropWhile_not p] simp theorem rdropWhile_prefix : l.rdropWhile p <+: l := by rw [← reverse_suffix, rdropWhile, reverse_reverse] exact dropWhile_suffix _	variable {p} {l}	Mathlib/Data/List/DropRight.lean	117	118
/- Copyright (c) 2021 Yakov Pechersky. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yakov Pechersky -/ import Mathlib.Data.List.Cycle import Mathlib.GroupTheory.Perm.Cycle.Type import Mathlib.GroupTheory.Perm.List /-! # Properties of cyclic permutations constructed from lists/cycles In the following, `{α : Type} [Fintype α] [DecidableEq α]`. ## Main definitions `Cycle.formPerm`: the cyclic permutation created by looping over a `Cycle α` * `Equiv.Perm.toList`: the list formed by iterating application of a permutation * `Equiv.Perm.toCycle`: the cycle formed by iterating application of a permutation * `Equiv.Perm.isoCycle`: the equivalence between cyclic permutations `f : Perm α` and the terms of `Cycle α` that correspond to them * `Equiv.Perm.isoCycle'`: the same equivalence as `Equiv.Perm.isoCycle` but with evaluation via choosing over fintypes * The notation `c[1, 2, 3]` to emulate notation of cyclic permutations `(1 2 3)` * A `Repr` instance for any `Perm α`, by representing the `Finset` of `Cycle α` that correspond to the cycle factors. ## Main results * `List.isCycle_formPerm`: a nontrivial list without duplicates, when interpreted as a permutation, is cyclic * `Equiv.Perm.IsCycle.existsUnique_cycle`: there is only one nontrivial `Cycle α` corresponding to each cyclic `f : Perm α` ## Implementation details The forward direction of `Equiv.Perm.isoCycle'` uses `Fintype.choose` of the uniqueness result, relying on the `Fintype` instance of a `Cycle.Nodup` subtype. It is unclear if this works faster than the `Equiv.Perm.toCycle`, which relies on recursion over `Finset.univ`. -/ open Equiv Equiv.Perm List variable {α : Type*} namespace List variable [DecidableEq α] {l l' : List α} theorem formPerm_disjoint_iff (hl : Nodup l) (hl' : Nodup l') (hn : 2 ≤ l.length) (hn' : 2 ≤ l'.length) : Perm.Disjoint (formPerm l) (formPerm l') ↔ l.Disjoint l' := by rw [disjoint_iff_eq_or_eq, List.Disjoint] constructor · rintro h x hx hx' specialize h x rw [formPerm_apply_mem_eq_self_iff _ hl _ hx, formPerm_apply_mem_eq_self_iff _ hl' _ hx'] at h omega · intro h x by_cases hx : x ∈ l on_goal 1 => by_cases hx' : x ∈ l' · exact (h hx hx').elim all_goals have := formPerm_eq_self_of_not_mem _ _ ‹_›; tauto theorem isCycle_formPerm (hl : Nodup l) (hn : 2 ≤ l.length) : IsCycle (formPerm l) := by rcases l with - \| ⟨x, l⟩ · norm_num at hn induction' l with y l generalizing x · norm_num at hn · use x constructor · rwa [formPerm_apply_mem_ne_self_iff _ hl _ mem_cons_self] · intro w hw have : w ∈ x::y::l := mem_of_formPerm_ne_self _ _ hw obtain ⟨k, hk, rfl⟩ := getElem_of_mem this use k simp only [zpow_natCast, formPerm_pow_apply_head _ _ hl k, Nat.mod_eq_of_lt hk] theorem pairwise_sameCycle_formPerm (hl : Nodup l) (hn : 2 ≤ l.length) : Pairwise l.formPerm.SameCycle l := Pairwise.imp_mem.mpr (pairwise_of_forall fun _ _ hx hy => (isCycle_formPerm hl hn).sameCycle ((formPerm_apply_mem_ne_self_iff _ hl _ hx).mpr hn) ((formPerm_apply_mem_ne_self_iff _ hl _ hy).mpr hn)) theorem cycleOf_formPerm (hl : Nodup l) (hn : 2 ≤ l.length) (x) : cycleOf l.attach.formPerm x = l.attach.formPerm := have hn : 2 ≤ l.attach.length := by rwa [← length_attach] at hn have hl : l.attach.Nodup := by rwa [← nodup_attach] at hl (isCycle_formPerm hl hn).cycleOf_eq ((formPerm_apply_mem_ne_self_iff _ hl _ (mem_attach _ _)).mpr hn) theorem cycleType_formPerm (hl : Nodup l) (hn : 2 ≤ l.length) : cycleType l.attach.formPerm = {l.length} := by rw [← length_attach] at hn rw [← nodup_attach] at hl rw [cycleType_eq [l.attach.formPerm]] · simp only [map, Function.comp_apply] rw [support_formPerm_of_nodup _ hl, card_toFinset, dedup_eq_self.mpr hl] · simp · intro x h simp [h, Nat.succ_le_succ_iff] at hn · simp · simpa using isCycle_formPerm hl hn · simp theorem formPerm_apply_mem_eq_next (hl : Nodup l) (x : α) (hx : x ∈ l) : formPerm l x = next l x hx := by obtain ⟨k, hk, rfl⟩ := getElem_of_mem hx rw [next_getElem _ hl, formPerm_apply_getElem _ hl] end List namespace Cycle variable [DecidableEq α] (s : Cycle α)	/-- A cycle `s : Cycle α`, given `Nodup s` can be interpreted as an `Equiv.Perm α` where each element in the list is permuted to the next one, defined as `formPerm`. -/	Mathlib/GroupTheory/Perm/Cycle/Concrete.lean	120	123
/- Copyright (c) 2022 Moritz Firsching. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Moritz Firsching, Fabian Kruse, Nikolas Kuhn -/ import Mathlib.Analysis.PSeries import Mathlib.Data.Real.Pi.Wallis import Mathlib.Tactic.AdaptationNote /-! # Stirling's formula This file proves Stirling's formula for the factorial. It states that $n!$ grows asymptotically like $\sqrt{2\pi n}(\frac{n}{e})^n$. ## Proof outline The proof follows: <https://proofwiki.org/wiki/Stirling%27s_Formula>. We proceed in two parts. Part 1: We consider the sequence $a_n$ of fractions $\frac{n!}{\sqrt{2n}(\frac{n}{e})^n}$ and prove that this sequence converges to a real, positive number $a$. For this the two main ingredients are - taking the logarithm of the sequence and - using the series expansion of $\log(1 + x)$. Part 2: We use the fact that the series defined in part 1 converges against a real number $a$ and prove that $a = \sqrt{\pi}$. Here the main ingredient is the convergence of Wallis' product formula for `π`. -/ open scoped Topology Real Nat Asymptotics open Finset Filter Nat Real namespace Stirling /-! ### Part 1 https://proofwiki.org/wiki/Stirling%27s_Formula#Part_1 -/ /-- Define `stirlingSeq n` as $\frac{n!}{\sqrt{2n}(\frac{n}{e})^n}$. Stirling's formula states that this sequence has limit $\sqrt(π)$. -/ noncomputable def stirlingSeq (n : ℕ) : ℝ := n ! / (√(2 * n : ℝ) * (n / exp 1) ^ n) @[simp] theorem stirlingSeq_zero : stirlingSeq 0 = 0 := by rw [stirlingSeq, cast_zero, mul_zero, Real.sqrt_zero, zero_mul, div_zero] @[simp] theorem stirlingSeq_one : stirlingSeq 1 = exp 1 / √2 := by rw [stirlingSeq, pow_one, factorial_one, cast_one, mul_one, mul_one_div, one_div_div] theorem log_stirlingSeq_formula (n : ℕ) : log (stirlingSeq n) = Real.log n ! - 1 / 2 * Real.log (2 * n) - n * log (n / exp 1) := by cases n · simp · rw [stirlingSeq, log_div, log_mul, sqrt_eq_rpow, log_rpow, Real.log_pow, tsub_tsub] <;> positivity /-- The sequence `log (stirlingSeq (m + 1)) - log (stirlingSeq (m + 2))` has the series expansion `∑ 1 / (2 * (k + 1) + 1) * (1 / 2 * (m + 1) + 1)^(2 * (k + 1))` -/ theorem log_stirlingSeq_diff_hasSum (m : ℕ) : HasSum (fun k : ℕ => (1 : ℝ) / (2 * ↑(k + 1) + 1) * ((1 / (2 * ↑(m + 1) + 1)) ^ 2) ^ ↑(k + 1)) (log (stirlingSeq (m + 1)) - log (stirlingSeq (m + 2))) := by let f (k : ℕ) := (1 : ℝ) / (2 * k + 1) * ((1 / (2 * ↑(m + 1) + 1)) ^ 2) ^ k change HasSum (fun k => f (k + 1)) _ rw [hasSum_nat_add_iff] convert (hasSum_log_one_add_inv m.cast_add_one_pos).mul_left ((↑(m + 1) : ℝ) + 1 / 2) using 1 · ext k dsimp only [f] rw [← pow_mul, pow_add] push_cast field_simp ring · have h : ∀ x ≠ (0 : ℝ), 1 + x⁻¹ = (x + 1) / x := fun x hx ↦ by field_simp [hx] simp (disch := positivity) only [log_stirlingSeq_formula, log_div, log_mul, log_exp, factorial_succ, cast_mul, cast_succ, cast_zero, range_one, sum_singleton, h] ring /-- The sequence `log ∘ stirlingSeq ∘ succ` is monotone decreasing -/ theorem log_stirlingSeq'_antitone : Antitone (Real.log ∘ stirlingSeq ∘ succ) := antitone_nat_of_succ_le fun n => sub_nonneg.mp <\| (log_stirlingSeq_diff_hasSum n).nonneg fun m => by positivity /-- We have a bound for successive elements in the sequence `log (stirlingSeq k)`. -/ theorem log_stirlingSeq_diff_le_geo_sum (n : ℕ) : log (stirlingSeq (n + 1)) - log (stirlingSeq (n + 2)) ≤ ((1 : ℝ) / (2 * ↑(n + 1) + 1)) ^ 2 / (1 - ((1 : ℝ) / (2 * ↑(n + 1) + 1)) ^ 2) := by have h_nonneg : (0 : ℝ) ≤ ((1 : ℝ) / (2 * ↑(n + 1) + 1)) ^ 2 := sq_nonneg _ have g : HasSum (fun k : ℕ => (((1 : ℝ) / (2 * ↑(n + 1) + 1)) ^ 2) ^ ↑(k + 1)) (((1 : ℝ) / (2 * ↑(n + 1) + 1)) ^ 2 / (1 - ((1 : ℝ) / (2 * ↑(n + 1) + 1)) ^ 2)) := by have := (hasSum_geometric_of_lt_one h_nonneg ?_).mul_left (((1 : ℝ) / (2 * ↑(n + 1) + 1)) ^ 2) · simp_rw [← _root_.pow_succ'] at this exact this rw [one_div, inv_pow] exact inv_lt_one_of_one_lt₀ (one_lt_pow₀ (lt_add_of_pos_left _ <\| by positivity) two_ne_zero) have hab (k : ℕ) : (1 : ℝ) / (2 * ↑(k + 1) + 1) * ((1 / (2 * ↑(n + 1) + 1)) ^ 2) ^ ↑(k + 1) ≤ (((1 : ℝ) / (2 * ↑(n + 1) + 1)) ^ 2) ^ ↑(k + 1) := by refine mul_le_of_le_one_left (pow_nonneg h_nonneg ↑(k + 1)) ?_ rw [one_div] exact inv_le_one_of_one_le₀ (le_add_of_nonneg_left <\| by positivity) exact hasSum_le hab (log_stirlingSeq_diff_hasSum n) g /-- We have the bound `log (stirlingSeq n) - log (stirlingSeq (n+1))` ≤ 1/(4 n^2) -/ theorem log_stirlingSeq_sub_log_stirlingSeq_succ (n : ℕ) : log (stirlingSeq (n + 1)) - log (stirlingSeq (n + 2)) ≤ 1 / (4 * (↑(n + 1) : ℝ) ^ 2) := by have h₁ : (0 : ℝ) < 4 * ((n : ℝ) + 1) ^ 2 := by positivity have h₃ : (0 : ℝ) < (2 * ((n : ℝ) + 1) + 1) ^ 2 := by positivity have h₂ : (0 : ℝ) < 1 - (1 / (2 * ((n : ℝ) + 1) + 1)) ^ 2 := by rw [← mul_lt_mul_right h₃] have H : 0 < (2 * ((n : ℝ) + 1) + 1) ^ 2 - 1 := by nlinarith [cast_nonneg (α := ℝ) n] convert H using 1 <;> field_simp [h₃.ne'] refine (log_stirlingSeq_diff_le_geo_sum n).trans ?_ push_cast rw [div_le_div_iff₀ h₂ h₁] field_simp [h₃.ne'] rw [div_le_div_iff_of_pos_right h₃] ring_nf norm_cast omega /-- For any `n`, we have `log_stirlingSeq 1 - log_stirlingSeq n ≤ 1/4 * ∑' 1/k^2` -/ theorem log_stirlingSeq_bounded_aux : ∃ c : ℝ, ∀ n : ℕ, log (stirlingSeq 1) - log (stirlingSeq (n + 1)) ≤ c := by let d : ℝ := ∑' k : ℕ, (1 : ℝ) / (↑(k + 1) : ℝ) ^ 2 use 1 / 4 * d let log_stirlingSeq' : ℕ → ℝ := fun k => log (stirlingSeq (k + 1)) intro n have h₁ k : log_stirlingSeq' k - log_stirlingSeq' (k + 1) ≤ 1 / 4 * (1 / (↑(k + 1) : ℝ) ^ 2) := by convert log_stirlingSeq_sub_log_stirlingSeq_succ k using 1; field_simp have h₂ : (∑ k ∈ range n, 1 / (↑(k + 1) : ℝ) ^ 2) ≤ d := by have := (summable_nat_add_iff 1).mpr <\| Real.summable_one_div_nat_pow.mpr one_lt_two exact this.sum_le_tsum (range n) (fun k _ => by positivity) calc log (stirlingSeq 1) - log (stirlingSeq (n + 1)) = log_stirlingSeq' 0 - log_stirlingSeq' n := rfl _ = ∑ k ∈ range n, (log_stirlingSeq' k - log_stirlingSeq' (k + 1)) := by rw [← sum_range_sub' log_stirlingSeq' n] _ ≤ ∑ k ∈ range n, 1 / 4 * (1 / ↑((k + 1)) ^ 2) := sum_le_sum fun k _ => h₁ k _ = 1 / 4 * ∑ k ∈ range n, 1 / ↑((k + 1)) ^ 2 := by rw [mul_sum] _ ≤ 1 / 4 * d := by gcongr /-- The sequence `log_stirlingSeq` is bounded below for `n ≥ 1`. -/ theorem log_stirlingSeq_bounded_by_constant : ∃ c, ∀ n : ℕ, c ≤ log (stirlingSeq (n + 1)) := by obtain ⟨d, h⟩ := log_stirlingSeq_bounded_aux exact ⟨log (stirlingSeq 1) - d, fun n => sub_le_comm.mp (h n)⟩ /-- The sequence `stirlingSeq` is positive for `n > 0` -/ theorem stirlingSeq'_pos (n : ℕ) : 0 < stirlingSeq (n + 1) := by unfold stirlingSeq; positivity /-- The sequence `stirlingSeq` has a positive lower bound. -/ theorem stirlingSeq'_bounded_by_pos_constant : ∃ a, 0 < a ∧ ∀ n : ℕ, a ≤ stirlingSeq (n + 1) := by obtain ⟨c, h⟩ := log_stirlingSeq_bounded_by_constant refine ⟨exp c, exp_pos _, fun n => ?_⟩ rw [← le_log_iff_exp_le (stirlingSeq'_pos n)] exact h n /-- The sequence `stirlingSeq ∘ succ` is monotone decreasing -/ theorem stirlingSeq'_antitone : Antitone (stirlingSeq ∘ succ) := fun n m h => (log_le_log_iff (stirlingSeq'_pos m) (stirlingSeq'_pos n)).mp (log_stirlingSeq'_antitone h) /-- The limit `a` of the sequence `stirlingSeq` satisfies `0 < a` -/ theorem stirlingSeq_has_pos_limit_a : ∃ a : ℝ, 0 < a ∧ Tendsto stirlingSeq atTop (𝓝 a) := by obtain ⟨x, x_pos, hx⟩ := stirlingSeq'_bounded_by_pos_constant	have hx' : x ∈ lowerBounds (Set.range (stirlingSeq ∘ succ)) := by simpa [lowerBounds] using hx	Mathlib/Analysis/SpecialFunctions/Stirling.lean	176	176
/- Copyright (c) 2023 Michael Stoll. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Michael Stoll, Ralf Stephan -/ import Mathlib.Data.Nat.Factorization.Defs import Mathlib.Data.Nat.Squarefree /-! # Smooth numbers For `s : Finset ℕ` we define the set `Nat.factoredNumbers s` of "`s`-factored numbers" consisting of the positive natural numbers all of whose prime factors are in `s`, and we provide some API for this. We then define the set `Nat.smoothNumbers n` consisting of the positive natural numbers all of whose prime factors are strictly less than `n`. This is the special case `s = Finset.range n` of the set of `s`-factored numbers. We also define the finite set `Nat.primesBelow n` to be the set of prime numbers less than `n`. The main definition `Nat.equivProdNatSmoothNumbers` establishes the bijection between `ℕ × (smoothNumbers p)` and `smoothNumbers (p+1)` given by sending `(e, n)` to `p^e * n`. Here `p` is a prime number. It is obtained from the more general bijection between `ℕ × (factoredNumbers s)` and `factoredNumbers (s ∪ {p})`; see `Nat.equivProdNatFactoredNumbers`. Additionally, we define `Nat.smoothNumbersUpTo N n` as the `Finset` of `n`-smooth numbers up to and including `N`, and similarly `Nat.roughNumbersUpTo` for its complement in `{1, ..., N}`, and we provide some API, in particular bounds for their cardinalities; see `Nat.smoothNumbersUpTo_card_le` and `Nat.roughNumbersUpTo_card_le`. -/ open scoped Finset namespace Nat /-- `primesBelow n` is the set of primes less than `n` as a `Finset`. -/ def primesBelow (n : ℕ) : Finset ℕ := {p ∈ Finset.range n \| p.Prime} @[simp] lemma primesBelow_zero : primesBelow 0 = ∅ := by rw [primesBelow, Finset.range_zero, Finset.filter_empty] lemma mem_primesBelow {k n : ℕ} : n ∈ primesBelow k ↔ n < k ∧ n.Prime := by simp [primesBelow] lemma prime_of_mem_primesBelow {p n : ℕ} (h : p ∈ n.primesBelow) : p.Prime := (Finset.mem_filter.mp h).2 lemma lt_of_mem_primesBelow {p n : ℕ} (h : p ∈ n.primesBelow) : p < n := Finset.mem_range.mp <\| Finset.mem_of_mem_filter p h lemma primesBelow_succ (n : ℕ) : primesBelow (n + 1) = if n.Prime then insert n (primesBelow n) else primesBelow n := by rw [primesBelow, primesBelow, Finset.range_succ, Finset.filter_insert] lemma not_mem_primesBelow (n : ℕ) : n ∉ primesBelow n := fun hn ↦ (lt_of_mem_primesBelow hn).false /-! ### `s`-factored numbers -/ /-- `factoredNumbers s`, for a finite set `s` of natural numbers, is the set of positive natural numbers all of whose prime factors are in `s`. -/ def factoredNumbers (s : Finset ℕ) : Set ℕ := {m \| m ≠ 0 ∧ ∀ p ∈ primeFactorsList m, p ∈ s} lemma mem_factoredNumbers {s : Finset ℕ} {m : ℕ} : m ∈ factoredNumbers s ↔ m ≠ 0 ∧ ∀ p ∈ primeFactorsList m, p ∈ s := Iff.rfl /-- Membership in `Nat.factoredNumbers n` is decidable. -/ instance (s : Finset ℕ) : DecidablePred (· ∈ factoredNumbers s) := inferInstanceAs <\| DecidablePred fun x ↦ x ∈ {m \| m ≠ 0 ∧ ∀ p ∈ primeFactorsList m, p ∈ s}	/-- A number that divides an `s`-factored number is itself `s`-factored. -/ lemma mem_factoredNumbers_of_dvd {s : Finset ℕ} {m k : ℕ} (h : m ∈ factoredNumbers s) (h' : k ∣ m) : k ∈ factoredNumbers s := by obtain ⟨h₁, h₂⟩ := h have hk := ne_zero_of_dvd_ne_zero h₁ h' refine ⟨hk, fun p hp ↦ h₂ p ?_⟩ rw [mem_primeFactorsList <\| by assumption] at hp ⊢	Mathlib/NumberTheory/SmoothNumbers.lean	75	83
/- Copyright (c) 2023 Alex Keizer. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Alex Keizer -/ import Mathlib.Data.Vector.Basic import Mathlib.Data.Vector.Snoc /-! This file establishes a set of normalization lemmas for `map`/`mapAccumr` operations on vectors -/ variable {α β γ ζ σ σ₁ σ₂ φ : Type*} {n : ℕ} {s : σ} {s₁ : σ₁} {s₂ : σ₂} namespace List namespace Vector /-! ## Fold nested `mapAccumr`s into one -/ section Fold section Unary variable (xs : Vector α n) (f₁ : β → σ₁ → σ₁ × γ) (f₂ : α → σ₂ → σ₂ × β) @[simp] theorem mapAccumr_mapAccumr : mapAccumr f₁ (mapAccumr f₂ xs s₂).snd s₁ = let m := (mapAccumr (fun x s => let r₂ := f₂ x s.snd let r₁ := f₁ r₂.snd s.fst ((r₁.fst, r₂.fst), r₁.snd) ) xs (s₁, s₂)) (m.fst.fst, m.snd) := by induction xs using Vector.revInductionOn generalizing s₁ s₂ <;> simp_all @[simp] theorem mapAccumr_map {s : σ₁} (f₂ : α → β) : (mapAccumr f₁ (map f₂ xs) s) = (mapAccumr (fun x s => f₁ (f₂ x) s) xs s) := by induction xs using Vector.revInductionOn generalizing s <;> simp_all @[simp] theorem map_mapAccumr {s : σ₂} (f₁ : β → γ) : (map f₁ (mapAccumr f₂ xs s).snd) = (mapAccumr (fun x s => let r := (f₂ x s); (r.fst, f₁ r.snd) ) xs s).snd := by induction xs using Vector.revInductionOn generalizing s <;> simp_all @[simp] theorem map_map (f₁ : β → γ) (f₂ : α → β) : map f₁ (map f₂ xs) = map (fun x => f₁ <\| f₂ x) xs := by induction xs <;> simp_all theorem map_pmap {p : α → Prop} (f₁ : β → γ) (f₂ : (a : α) → p a → β) (H : ∀ x ∈ xs.toList, p x): map f₁ (pmap f₂ xs H) = pmap (fun x hx => f₁ <\| f₂ x hx) xs H := by induction xs <;> simp_all theorem pmap_map {p : β → Prop} (f₁ : (b : β) → p b → γ) (f₂ : α → β) (H : ∀ x ∈ (xs.map f₂).toList, p x): pmap f₁ (map f₂ xs) H = pmap (fun x hx => f₁ (f₂ x) hx) xs (by simpa using H) := by induction xs <;> simp_all end Unary section Binary variable (xs : Vector α n) (ys : Vector β n) @[simp] theorem mapAccumr₂_mapAccumr_left (f₁ : γ → β → σ₁ → σ₁ × ζ) (f₂ : α → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ (mapAccumr f₂ xs s₂).snd ys s₁) = let m := (mapAccumr₂ (fun x y s => let r₂ := f₂ x s.snd let r₁ := f₁ r₂.snd y s.fst ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂)) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem map₂_map_left (f₁ : γ → β → ζ) (f₂ : α → γ) : map₂ f₁ (map f₂ xs) ys = map₂ (fun x y => f₁ (f₂ x) y) xs ys := by induction xs, ys using Vector.revInductionOn₂ <;> simp_all @[simp] theorem mapAccumr₂_mapAccumr_right (f₁ : α → γ → σ₁ → σ₁ × ζ) (f₂ : β → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ xs (mapAccumr f₂ ys s₂).snd s₁) = let m := (mapAccumr₂ (fun x y s => let r₂ := f₂ y s.snd let r₁ := f₁ x r₂.snd s.fst ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂)) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem map₂_map_right (f₁ : α → γ → ζ) (f₂ : β → γ) : map₂ f₁ xs (map f₂ ys) = map₂ (fun x y => f₁ x (f₂ y)) xs ys := by induction xs, ys using Vector.revInductionOn₂ <;> simp_all @[simp] theorem mapAccumr_mapAccumr₂ (f₁ : γ → σ₁ → σ₁ × ζ) (f₂ : α → β → σ₂ → σ₂ × γ) : (mapAccumr f₁ (mapAccumr₂ f₂ xs ys s₂).snd s₁) = let m := mapAccumr₂ (fun x y s => let r₂ := f₂ x y s.snd let r₁ := f₁ r₂.snd s.fst ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem map_map₂ (f₁ : γ → ζ) (f₂ : α → β → γ) : map f₁ (map₂ f₂ xs ys) = map₂ (fun x y => f₁ <\| f₂ x y) xs ys := by induction xs, ys using Vector.revInductionOn₂ <;> simp_all @[simp] theorem mapAccumr₂_mapAccumr₂_left_left (f₁ : γ → α → σ₁ → σ₁ × φ) (f₂ : α → β → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ (mapAccumr₂ f₂ xs ys s₂).snd xs s₁) = let m := mapAccumr₂ (fun x y (s₁, s₂) => let r₂ := f₂ x y s₂ let r₁ := f₁ r₂.snd x s₁ ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem mapAccumr₂_mapAccumr₂_left_right (f₁ : γ → β → σ₁ → σ₁ × φ) (f₂ : α → β → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ (mapAccumr₂ f₂ xs ys s₂).snd ys s₁) = let m := mapAccumr₂ (fun x y (s₁, s₂) =>	let r₂ := f₂ x y s₂ let r₁ := f₁ r₂.snd y s₁ ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem mapAccumr₂_mapAccumr₂_right_left (f₁ : α → γ → σ₁ → σ₁ × φ) (f₂ : α → β → σ₂ → σ₂ × γ) :	Mathlib/Data/Vector/MapLemmas.lean	133	142
/- 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.Algebra.Order.Group.Indicator import Mathlib.MeasureTheory.OuterMeasure.Basic /-! # Operations on outer measures In this file we define algebraic operations (addition, scalar multiplication) on the type of outer measures on a type. We also show that outer measures on a type `α` form a complete lattice. ## References * <https://en.wikipedia.org/wiki/Outer_measure> ## Tags outer measure -/ noncomputable section open Set Function Filter open scoped NNReal Topology ENNReal namespace MeasureTheory namespace OuterMeasure section Basic variable {α β : Type} {m : OuterMeasure α} instance instZero : Zero (OuterMeasure α) := ⟨{ measureOf := fun _ => 0 empty := rfl mono := by intro _ _ _; exact le_refl 0 iUnion_nat := fun _ _ => zero_le _ }⟩ @[simp] theorem coe_zero : ⇑(0 : OuterMeasure α) = 0 := rfl instance instInhabited : Inhabited (OuterMeasure α) := ⟨0⟩ instance instAdd : Add (OuterMeasure α) := ⟨fun m₁ m₂ => { measureOf := fun s => m₁ s + m₂ s empty := show m₁ ∅ + m₂ ∅ = 0 by simp [OuterMeasure.empty] mono := fun {_ _} h => add_le_add (m₁.mono h) (m₂.mono h) iUnion_nat := fun s _ => calc m₁ (⋃ i, s i) + m₂ (⋃ i, s i) ≤ (∑' i, m₁ (s i)) + ∑' i, m₂ (s i) := add_le_add (measure_iUnion_le s) (measure_iUnion_le s) _ = _ := ENNReal.tsum_add.symm }⟩ @[simp] theorem coe_add (m₁ m₂ : OuterMeasure α) : ⇑(m₁ + m₂) = m₁ + m₂ := rfl theorem add_apply (m₁ m₂ : OuterMeasure α) (s : Set α) : (m₁ + m₂) s = m₁ s + m₂ s := rfl section SMul variable {R : Type} [SMul R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] variable {R' : Type} [SMul R' ℝ≥0∞] [IsScalarTower R' ℝ≥0∞ ℝ≥0∞] instance instSMul : SMul R (OuterMeasure α) := ⟨fun c m => { measureOf := fun s => c • m s empty := by simp only [measure_empty]; rw [← smul_one_mul c]; simp mono := fun {s t} h => by rw [← smul_one_mul c, ← smul_one_mul c (m t)] exact mul_left_mono (m.mono h) iUnion_nat := fun s _ => by simp_rw [← smul_one_mul c (m _), ENNReal.tsum_mul_left] exact mul_left_mono (measure_iUnion_le _) }⟩ @[simp] theorem coe_smul (c : R) (m : OuterMeasure α) : ⇑(c • m) = c • ⇑m := rfl theorem smul_apply (c : R) (m : OuterMeasure α) (s : Set α) : (c • m) s = c • m s := rfl instance instSMulCommClass [SMulCommClass R R' ℝ≥0∞] : SMulCommClass R R' (OuterMeasure α) := ⟨fun _ _ _ => ext fun _ => smul_comm _ _ _⟩ instance instIsScalarTower [SMul R R'] [IsScalarTower R R' ℝ≥0∞] : IsScalarTower R R' (OuterMeasure α) := ⟨fun _ _ _ => ext fun _ => smul_assoc _ _ _⟩ instance instIsCentralScalar [SMul Rᵐᵒᵖ ℝ≥0∞] [IsCentralScalar R ℝ≥0∞] : IsCentralScalar R (OuterMeasure α) := ⟨fun _ _ => ext fun _ => op_smul_eq_smul _ _⟩ end SMul instance instMulAction {R : Type} [Monoid R] [MulAction R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] : MulAction R (OuterMeasure α) := Injective.mulAction _ coe_fn_injective coe_smul instance addCommMonoid : AddCommMonoid (OuterMeasure α) := Injective.addCommMonoid (show OuterMeasure α → Set α → ℝ≥0∞ from _) coe_fn_injective rfl (fun _ _ => rfl) fun _ _ => rfl /-- `(⇑)` as an `AddMonoidHom`. -/ @[simps] def coeFnAddMonoidHom : OuterMeasure α →+ Set α → ℝ≥0∞ where toFun := (⇑) map_zero' := coe_zero map_add' := coe_add instance instDistribMulAction {R : Type} [Monoid R] [DistribMulAction R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] : DistribMulAction R (OuterMeasure α) := Injective.distribMulAction coeFnAddMonoidHom coe_fn_injective coe_smul instance instModule {R : Type} [Semiring R] [Module R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] : Module R (OuterMeasure α) := Injective.module R coeFnAddMonoidHom coe_fn_injective coe_smul instance instBot : Bot (OuterMeasure α) := ⟨0⟩ @[simp] theorem coe_bot : (⊥ : OuterMeasure α) = 0 := rfl instance instPartialOrder : PartialOrder (OuterMeasure α) where le m₁ m₂ := ∀ s, m₁ s ≤ m₂ s le_refl _ _ := le_rfl le_trans _ _ _ hab hbc s := le_trans (hab s) (hbc s) le_antisymm _ _ hab hba := ext fun s => le_antisymm (hab s) (hba s) instance orderBot : OrderBot (OuterMeasure α) := { bot := 0, bot_le := fun a s => by simp only [coe_zero, Pi.zero_apply, coe_bot, zero_le] } theorem univ_eq_zero_iff (m : OuterMeasure α) : m univ = 0 ↔ m = 0 := ⟨fun h => bot_unique fun s => (measure_mono <\| subset_univ s).trans_eq h, fun h => h.symm ▸ rfl⟩ section Supremum instance instSupSet : SupSet (OuterMeasure α) := ⟨fun ms => { measureOf := fun s => ⨆ m ∈ ms, (m : OuterMeasure α) s empty := nonpos_iff_eq_zero.1 <\| iSup₂_le fun m _ => le_of_eq m.empty mono := fun {_ _} hs => iSup₂_mono fun m _ => m.mono hs iUnion_nat := fun f _ => iSup₂_le fun m hm => calc m (⋃ i, f i) ≤ ∑' i : ℕ, m (f i) := measure_iUnion_le _ _ ≤ ∑' i, ⨆ m ∈ ms, (m : OuterMeasure α) (f i) := ENNReal.tsum_le_tsum fun i => by apply le_iSup₂ m hm }⟩ instance instCompleteLattice : CompleteLattice (OuterMeasure α) := { OuterMeasure.orderBot, completeLatticeOfSup (OuterMeasure α) fun ms => ⟨fun m hm s => by apply le_iSup₂ m hm, fun _ hm s => iSup₂_le fun _ hm' => hm hm' s⟩ with } @[simp] theorem sSup_apply (ms : Set (OuterMeasure α)) (s : Set α) : (sSup ms) s = ⨆ m ∈ ms, (m : OuterMeasure α) s := rfl @[simp] theorem iSup_apply {ι} (f : ι → OuterMeasure α) (s : Set α) : (⨆ i : ι, f i) s = ⨆ i, f i s := by rw [iSup, sSup_apply, iSup_range] @[norm_cast] theorem coe_iSup {ι} (f : ι → OuterMeasure α) : ⇑(⨆ i, f i) = ⨆ i, ⇑(f i) := funext fun s => by simp @[simp] theorem sup_apply (m₁ m₂ : OuterMeasure α) (s : Set α) : (m₁ ⊔ m₂) s = m₁ s ⊔ m₂ s := by have := iSup_apply (fun b => cond b m₁ m₂) s; rwa [iSup_bool_eq, iSup_bool_eq] at this theorem smul_iSup {R : Type} [SMul R ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] {ι : Sort} (f : ι → OuterMeasure α) (c : R) : (c • ⨆ i, f i) = ⨆ i, c • f i := ext fun s => by simp only [smul_apply, iSup_apply, ENNReal.smul_iSup] end Supremum @[mono, gcongr] theorem mono'' {m₁ m₂ : OuterMeasure α} {s₁ s₂ : Set α} (hm : m₁ ≤ m₂) (hs : s₁ ⊆ s₂) : m₁ s₁ ≤ m₂ s₂ := (hm s₁).trans (m₂.mono hs) /-- The pushforward of `m` along `f`. The outer measure on `s` is defined to be `m (f ⁻¹' s)`. -/ def map {β} (f : α → β) : OuterMeasure α →ₗ[ℝ≥0∞] OuterMeasure β where toFun m := { measureOf := fun s => m (f ⁻¹' s) empty := m.empty mono := fun {_ _} h => m.mono (preimage_mono h) iUnion_nat := fun s _ => by simpa using measure_iUnion_le fun i => f ⁻¹' s i } map_add' _ _ := coe_fn_injective rfl map_smul' _ _ := coe_fn_injective rfl @[simp] theorem map_apply {β} (f : α → β) (m : OuterMeasure α) (s : Set β) : map f m s = m (f ⁻¹' s) := rfl @[simp] theorem map_id (m : OuterMeasure α) : map id m = m := ext fun _ => rfl @[simp] theorem map_map {β γ} (f : α → β) (g : β → γ) (m : OuterMeasure α) : map g (map f m) = map (g ∘ f) m := ext fun _ => rfl @[mono] theorem map_mono {β} (f : α → β) : Monotone (map f) := fun _ _ h _ => h _ @[simp] theorem map_sup {β} (f : α → β) (m m' : OuterMeasure α) : map f (m ⊔ m') = map f m ⊔ map f m' := ext fun s => by simp only [map_apply, sup_apply] @[simp] theorem map_iSup {β ι} (f : α → β) (m : ι → OuterMeasure α) : map f (⨆ i, m i) = ⨆ i, map f (m i) := ext fun s => by simp only [map_apply, iSup_apply] instance instFunctor : Functor OuterMeasure where map {_ _} f := map f instance instLawfulFunctor : LawfulFunctor OuterMeasure := by constructor <;> intros <;> rfl /-- The dirac outer measure. -/ def dirac (a : α) : OuterMeasure α where measureOf s := indicator s (fun _ => 1) a empty := by simp mono {_ _} h := indicator_le_indicator_of_subset h (fun _ => zero_le _) a iUnion_nat s _ := calc indicator (⋃ n, s n) 1 a = ⨆ n, indicator (s n) 1 a := indicator_iUnion_apply (M := ℝ≥0∞) rfl _ _ _ _ ≤ ∑' n, indicator (s n) 1 a := iSup_le fun _ ↦ ENNReal.le_tsum _ @[simp] theorem dirac_apply (a : α) (s : Set α) : dirac a s = indicator s (fun _ => 1) a := rfl /-- The sum of an (arbitrary) collection of outer measures. -/ def sum {ι} (f : ι → OuterMeasure α) : OuterMeasure α where measureOf s := ∑' i, f i s empty := by simp mono {_ _} h := ENNReal.tsum_le_tsum fun _ => measure_mono h iUnion_nat s _ := by rw [ENNReal.tsum_comm]; exact ENNReal.tsum_le_tsum fun i => measure_iUnion_le _ @[simp] theorem sum_apply {ι} (f : ι → OuterMeasure α) (s : Set α) : sum f s = ∑' i, f i s := rfl theorem smul_dirac_apply (a : ℝ≥0∞) (b : α) (s : Set α) : (a • dirac b) s = indicator s (fun _ => a) b := by simp only [smul_apply, smul_eq_mul, dirac_apply, ← indicator_mul_right _ fun _ => a, mul_one] /-- Pullback of an `OuterMeasure`: `comap f μ s = μ (f '' s)`. -/ def comap {β} (f : α → β) : OuterMeasure β →ₗ[ℝ≥0∞] OuterMeasure α where toFun m := { measureOf := fun s => m (f '' s) empty := by simp mono := fun {_ _} h => m.mono <\| image_subset f h iUnion_nat := fun s _ => by simpa only [image_iUnion] using measure_iUnion_le _ } map_add' _ _ := rfl map_smul' _ _ := rfl @[simp] theorem comap_apply {β} (f : α → β) (m : OuterMeasure β) (s : Set α) : comap f m s = m (f '' s) := rfl @[mono] theorem comap_mono {β} (f : α → β) : Monotone (comap f) := fun _ _ h _ => h _ @[simp] theorem comap_iSup {β ι} (f : α → β) (m : ι → OuterMeasure β) : comap f (⨆ i, m i) = ⨆ i, comap f (m i) := ext fun s => by simp only [comap_apply, iSup_apply] /-- Restrict an `OuterMeasure` to a set. -/ def restrict (s : Set α) : OuterMeasure α →ₗ[ℝ≥0∞] OuterMeasure α := (map (↑)).comp (comap ((↑) : s → α)) -- TODO (kmill): change `m (t ∩ s)` to `m (s ∩ t)` @[simp] theorem restrict_apply (s t : Set α) (m : OuterMeasure α) : restrict s m t = m (t ∩ s) := by simp [restrict, inter_comm t] @[mono] theorem restrict_mono {s t : Set α} (h : s ⊆ t) {m m' : OuterMeasure α} (hm : m ≤ m') : restrict s m ≤ restrict t m' := fun u => by simp only [restrict_apply] exact (hm _).trans (m'.mono <\| inter_subset_inter_right _ h) @[simp] theorem restrict_univ (m : OuterMeasure α) : restrict univ m = m := ext fun s => by simp @[simp] theorem restrict_empty (m : OuterMeasure α) : restrict ∅ m = 0 := ext fun s => by simp @[simp] theorem restrict_iSup {ι} (s : Set α) (m : ι → OuterMeasure α) : restrict s (⨆ i, m i) = ⨆ i, restrict s (m i) := by simp [restrict] theorem map_comap {β} (f : α → β) (m : OuterMeasure β) : map f (comap f m) = restrict (range f) m := ext fun s => congr_arg m <\| by simp only [image_preimage_eq_inter_range, Subtype.range_coe] theorem map_comap_le {β} (f : α → β) (m : OuterMeasure β) : map f (comap f m) ≤ m := fun _ => m.mono <\| image_preimage_subset _ _ theorem restrict_le_self (m : OuterMeasure α) (s : Set α) : restrict s m ≤ m := map_comap_le _ _ @[simp] theorem map_le_restrict_range {β} {ma : OuterMeasure α} {mb : OuterMeasure β} {f : α → β} : map f ma ≤ restrict (range f) mb ↔ map f ma ≤ mb := ⟨fun h => h.trans (restrict_le_self _ _), fun h s => by simpa using h (s ∩ range f)⟩ theorem map_comap_of_surjective {β} {f : α → β} (hf : Surjective f) (m : OuterMeasure β) : map f (comap f m) = m := ext fun s => by rw [map_apply, comap_apply, hf.image_preimage] theorem le_comap_map {β} (f : α → β) (m : OuterMeasure α) : m ≤ comap f (map f m) := fun _ => m.mono <\| subset_preimage_image _ _ theorem comap_map {β} {f : α → β} (hf : Injective f) (m : OuterMeasure α) : comap f (map f m) = m := ext fun s => by rw [comap_apply, map_apply, hf.preimage_image] @[simp] theorem top_apply {s : Set α} (h : s.Nonempty) : (⊤ : OuterMeasure α) s = ∞ := let ⟨a, as⟩ := h top_unique <\| le_trans (by simp [smul_dirac_apply, as]) (le_iSup₂ (∞ • dirac a) trivial) theorem top_apply' (s : Set α) : (⊤ : OuterMeasure α) s = ⨅ _ : s = ∅, 0 := s.eq_empty_or_nonempty.elim (fun h => by simp [h]) fun h => by simp [h, h.ne_empty] @[simp] theorem comap_top (f : α → β) : comap f ⊤ = ⊤ := ext_nonempty fun s hs => by rw [comap_apply, top_apply hs, top_apply (hs.image _)] theorem map_top (f : α → β) : map f ⊤ = restrict (range f) ⊤ := ext fun s => by rw [map_apply, restrict_apply, ← image_preimage_eq_inter_range, top_apply', top_apply', Set.image_eq_empty] @[simp] theorem map_top_of_surjective (f : α → β) (hf : Surjective f) : map f ⊤ = ⊤ := by rw [map_top, hf.range_eq, restrict_univ] end Basic end OuterMeasure end MeasureTheory		Mathlib/MeasureTheory/OuterMeasure/Operations.lean	388	390
/- 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) :=	Mathlib/MeasureTheory/Measure/MeasureSpace.lean	1,055	1,067
/- Copyright (c) 2020 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel, Johan Commelin -/ import Mathlib.Analysis.Analytic.Basic import Mathlib.Combinatorics.Enumerative.Composition /-! # Composition of analytic functions In this file we prove that the composition of analytic functions is analytic. The argument is the following. Assume `g z = ∑' qₙ (z, ..., z)` and `f y = ∑' pₖ (y, ..., y)`. Then `g (f y) = ∑' qₙ (∑' pₖ (y, ..., y), ..., ∑' pₖ (y, ..., y)) = ∑' qₙ (p_{i₁} (y, ..., y), ..., p_{iₙ} (y, ..., y))`. For each `n` and `i₁, ..., iₙ`, define a `i₁ + ... + iₙ` multilinear function mapping `(y₀, ..., y_{i₁ + ... + iₙ - 1})` to `qₙ (p_{i₁} (y₀, ..., y_{i₁-1}), p_{i₂} (y_{i₁}, ..., y_{i₁ + i₂ - 1}), ..., p_{iₙ} (....)))`. Then `g ∘ f` is obtained by summing all these multilinear functions. To formalize this, we use compositions of an integer `N`, i.e., its decompositions into a sum `i₁ + ... + iₙ` of positive integers. Given such a composition `c` and two formal multilinear series `q` and `p`, let `q.compAlongComposition p c` be the above multilinear function. Then the `N`-th coefficient in the power series expansion of `g ∘ f` is the sum of these terms over all `c : Composition N`. To complete the proof, we need to show that this power series has a positive radius of convergence. This follows from the fact that `Composition N` has cardinality `2^(N-1)` and estimates on the norm of `qₙ` and `pₖ`, which give summability. We also need to show that it indeed converges to `g ∘ f`. For this, we note that the composition of partial sums converges to `g ∘ f`, and that it corresponds to a part of the whole sum, on a subset that increases to the whole space. By summability of the norms, this implies the overall convergence. ## Main results * `q.comp p` is the formal composition of the formal multilinear series `q` and `p`. * `HasFPowerSeriesAt.comp` states that if two functions `g` and `f` admit power series expansions `q` and `p`, then `g ∘ f` admits a power series expansion given by `q.comp p`. * `AnalyticAt.comp` states that the composition of analytic functions is analytic. * `FormalMultilinearSeries.comp_assoc` states that composition is associative on formal multilinear series. ## Implementation details The main technical difficulty is to write down things. In particular, we need to define precisely `q.compAlongComposition p c` and to show that it is indeed a continuous multilinear function. This requires a whole interface built on the class `Composition`. Once this is set, the main difficulty is to reorder the sums, writing the composition of the partial sums as a sum over some subset of `Σ n, Composition n`. We need to check that the reordering is a bijection, running over difficulties due to the dependent nature of the types under consideration, that are controlled thanks to the interface for `Composition`. The associativity of composition on formal multilinear series is a nontrivial result: it does not follow from the associativity of composition of analytic functions, as there is no uniqueness for the formal multilinear series representing a function (and also, it holds even when the radius of convergence of the series is `0`). Instead, we give a direct proof, which amounts to reordering double sums in a careful way. The change of variables is a canonical (combinatorial) bijection `Composition.sigmaEquivSigmaPi` between `(Σ (a : Composition n), Composition a.length)` and `(Σ (c : Composition n), Π (i : Fin c.length), Composition (c.blocksFun i))`, and is described in more details below in the paragraph on associativity. -/ noncomputable section variable {𝕜 : Type} {E F G H : Type} open Filter List open scoped Topology NNReal ENNReal section Topological variable [CommRing 𝕜] [AddCommGroup E] [AddCommGroup F] [AddCommGroup G] variable [Module 𝕜 E] [Module 𝕜 F] [Module 𝕜 G] variable [TopologicalSpace E] [TopologicalSpace F] [TopologicalSpace G] /-! ### Composing formal multilinear series -/ namespace FormalMultilinearSeries variable [IsTopologicalAddGroup E] [ContinuousConstSMul 𝕜 E] variable [IsTopologicalAddGroup F] [ContinuousConstSMul 𝕜 F] variable [IsTopologicalAddGroup G] [ContinuousConstSMul 𝕜 G] /-! In this paragraph, we define the composition of formal multilinear series, by summing over all possible compositions of `n`. -/ /-- Given a formal multilinear series `p`, a composition `c` of `n` and the index `i` of a block of `c`, we may define a function on `Fin n → E` by picking the variables in the `i`-th block of `n`, and applying the corresponding coefficient of `p` to these variables. This function is called `p.applyComposition c v i` for `v : Fin n → E` and `i : Fin c.length`. -/ def applyComposition (p : FormalMultilinearSeries 𝕜 E F) {n : ℕ} (c : Composition n) : (Fin n → E) → Fin c.length → F := fun v i => p (c.blocksFun i) (v ∘ c.embedding i) theorem applyComposition_ones (p : FormalMultilinearSeries 𝕜 E F) (n : ℕ) : p.applyComposition (Composition.ones n) = fun v i => p 1 fun _ => v (Fin.castLE (Composition.length_le _) i) := by funext v i apply p.congr (Composition.ones_blocksFun _ _) intro j hjn hj1 obtain rfl : j = 0 := by omega refine congr_arg v ?_ rw [Fin.ext_iff, Fin.coe_castLE, Composition.ones_embedding, Fin.val_mk] theorem applyComposition_single (p : FormalMultilinearSeries 𝕜 E F) {n : ℕ} (hn : 0 < n) (v : Fin n → E) : p.applyComposition (Composition.single n hn) v = fun _j => p n v := by ext j refine p.congr (by simp) fun i hi1 hi2 => ?_ dsimp congr 1 convert Composition.single_embedding hn ⟨i, hi2⟩ using 1 obtain ⟨j_val, j_property⟩ := j have : j_val = 0 := le_bot_iff.1 (Nat.lt_succ_iff.1 j_property) congr! simp @[simp] theorem removeZero_applyComposition (p : FormalMultilinearSeries 𝕜 E F) {n : ℕ} (c : Composition n) : p.removeZero.applyComposition c = p.applyComposition c := by ext v i simp [applyComposition, zero_lt_one.trans_le (c.one_le_blocksFun i), removeZero_of_pos] /-- Technical lemma stating how `p.applyComposition` commutes with updating variables. This will be the key point to show that functions constructed from `applyComposition` retain multilinearity. -/ theorem applyComposition_update (p : FormalMultilinearSeries 𝕜 E F) {n : ℕ} (c : Composition n) (j : Fin n) (v : Fin n → E) (z : E) : p.applyComposition c (Function.update v j z) = Function.update (p.applyComposition c v) (c.index j) (p (c.blocksFun (c.index j)) (Function.update (v ∘ c.embedding (c.index j)) (c.invEmbedding j) z)) := by ext k by_cases h : k = c.index j · rw [h] let r : Fin (c.blocksFun (c.index j)) → Fin n := c.embedding (c.index j) simp only [Function.update_self] change p (c.blocksFun (c.index j)) (Function.update v j z ∘ r) = _ let j' := c.invEmbedding j suffices B : Function.update v j z ∘ r = Function.update (v ∘ r) j' z by rw [B] suffices C : Function.update v (r j') z ∘ r = Function.update (v ∘ r) j' z by convert C; exact (c.embedding_comp_inv j).symm exact Function.update_comp_eq_of_injective _ (c.embedding _).injective _ _ · simp only [h, Function.update_eq_self, Function.update_of_ne, Ne, not_false_iff] let r : Fin (c.blocksFun k) → Fin n := c.embedding k change p (c.blocksFun k) (Function.update v j z ∘ r) = p (c.blocksFun k) (v ∘ r) suffices B : Function.update v j z ∘ r = v ∘ r by rw [B] apply Function.update_comp_eq_of_not_mem_range rwa [c.mem_range_embedding_iff'] @[simp] theorem compContinuousLinearMap_applyComposition {n : ℕ} (p : FormalMultilinearSeries 𝕜 F G) (f : E →L[𝕜] F) (c : Composition n) (v : Fin n → E) : (p.compContinuousLinearMap f).applyComposition c v = p.applyComposition c (f ∘ v) := by simp (config := {unfoldPartialApp := true}) [applyComposition]; rfl end FormalMultilinearSeries namespace ContinuousMultilinearMap open FormalMultilinearSeries variable [IsTopologicalAddGroup E] [ContinuousConstSMul 𝕜 E] variable [IsTopologicalAddGroup F] [ContinuousConstSMul 𝕜 F] /-- Given a formal multilinear series `p`, a composition `c` of `n` and a continuous multilinear map `f` in `c.length` variables, one may form a continuous multilinear map in `n` variables by applying the right coefficient of `p` to each block of the composition, and then applying `f` to the resulting vector. It is called `f.compAlongComposition p c`. -/ def compAlongComposition {n : ℕ} (p : FormalMultilinearSeries 𝕜 E F) (c : Composition n) (f : F [×c.length]→L[𝕜] G) : E [×n]→L[𝕜] G where toMultilinearMap := MultilinearMap.mk' (fun v ↦ f (p.applyComposition c v)) (fun v i x y ↦ by simp only [applyComposition_update, map_update_add]) (fun v i c x ↦ by simp only [applyComposition_update, map_update_smul]) cont := f.cont.comp <\| continuous_pi fun _ => (coe_continuous _).comp <\| continuous_pi fun _ => continuous_apply _ @[simp] theorem compAlongComposition_apply {n : ℕ} (p : FormalMultilinearSeries 𝕜 E F) (c : Composition n) (f : F [×c.length]→L[𝕜] G) (v : Fin n → E) : (f.compAlongComposition p c) v = f (p.applyComposition c v) := rfl end ContinuousMultilinearMap namespace FormalMultilinearSeries variable [IsTopologicalAddGroup E] [ContinuousConstSMul 𝕜 E] variable [IsTopologicalAddGroup F] [ContinuousConstSMul 𝕜 F] variable [IsTopologicalAddGroup G] [ContinuousConstSMul 𝕜 G] /-- Given two formal multilinear series `q` and `p` and a composition `c` of `n`, one may form a continuous multilinear map in `n` variables by applying the right coefficient of `p` to each block of the composition, and then applying `q c.length` to the resulting vector. It is called `q.compAlongComposition p c`. -/ def compAlongComposition {n : ℕ} (q : FormalMultilinearSeries 𝕜 F G) (p : FormalMultilinearSeries 𝕜 E F) (c : Composition n) : (E [×n]→L[𝕜] G) := (q c.length).compAlongComposition p c @[simp] theorem compAlongComposition_apply {n : ℕ} (q : FormalMultilinearSeries 𝕜 F G) (p : FormalMultilinearSeries 𝕜 E F) (c : Composition n) (v : Fin n → E) : (q.compAlongComposition p c) v = q c.length (p.applyComposition c v) := rfl /-- Formal composition of two formal multilinear series. The `n`-th coefficient in the composition is defined to be the sum of `q.compAlongComposition p c` over all compositions of `n`. In other words, this term (as a multilinear function applied to `v_0, ..., v_{n-1}`) is `∑'_{k} ∑'_{i₁ + ... + iₖ = n} qₖ (p_{i_1} (...), ..., p_{i_k} (...))`, where one puts all variables `v_0, ..., v_{n-1}` in increasing order in the dots. In general, the composition `q ∘ p` only makes sense when the constant coefficient of `p` vanishes. We give a general formula but which ignores the value of `p 0` instead. -/ protected def comp (q : FormalMultilinearSeries 𝕜 F G) (p : FormalMultilinearSeries 𝕜 E F) : FormalMultilinearSeries 𝕜 E G := fun n => ∑ c : Composition n, q.compAlongComposition p c /-- The `0`-th coefficient of `q.comp p` is `q 0`. Since these maps are multilinear maps in zero variables, but on different spaces, we can not state this directly, so we state it when applied to arbitrary vectors (which have to be the zero vector). -/ theorem comp_coeff_zero (q : FormalMultilinearSeries 𝕜 F G) (p : FormalMultilinearSeries 𝕜 E F) (v : Fin 0 → E) (v' : Fin 0 → F) : (q.comp p) 0 v = q 0 v' := by let c : Composition 0 := Composition.ones 0 dsimp [FormalMultilinearSeries.comp] have : {c} = (Finset.univ : Finset (Composition 0)) := by apply Finset.eq_of_subset_of_card_le <;> simp [Finset.card_univ, composition_card 0] rw [← this, Finset.sum_singleton, compAlongComposition_apply] symm; congr! -- Porting note: needed the stronger `congr!`! @[simp] theorem comp_coeff_zero' (q : FormalMultilinearSeries 𝕜 F G) (p : FormalMultilinearSeries 𝕜 E F) (v : Fin 0 → E) : (q.comp p) 0 v = q 0 fun _i => 0 := q.comp_coeff_zero p v _ /-- The `0`-th coefficient of `q.comp p` is `q 0`. When `p` goes from `E` to `E`, this can be expressed as a direct equality -/ theorem comp_coeff_zero'' (q : FormalMultilinearSeries 𝕜 E F) (p : FormalMultilinearSeries 𝕜 E E) : (q.comp p) 0 = q 0 := by ext v; exact q.comp_coeff_zero p _ _ /-- The first coefficient of a composition of formal multilinear series is the composition of the first coefficients seen as continuous linear maps. -/ theorem comp_coeff_one (q : FormalMultilinearSeries 𝕜 F G) (p : FormalMultilinearSeries 𝕜 E F) (v : Fin 1 → E) : (q.comp p) 1 v = q 1 fun _i => p 1 v := by have : {Composition.ones 1} = (Finset.univ : Finset (Composition 1)) := Finset.eq_univ_of_card _ (by simp [composition_card]) simp only [FormalMultilinearSeries.comp, compAlongComposition_apply, ← this, Finset.sum_singleton] refine q.congr (by simp) fun i hi1 hi2 => ?_ simp only [applyComposition_ones] exact p.congr rfl fun j _hj1 hj2 => by congr! -- Porting note: needed the stronger `congr!` /-- Only `0`-th coefficient of `q.comp p` depends on `q 0`. -/ theorem removeZero_comp_of_pos (q : FormalMultilinearSeries 𝕜 F G) (p : FormalMultilinearSeries 𝕜 E F) {n : ℕ} (hn : 0 < n) : q.removeZero.comp p n = q.comp p n := by ext v simp only [FormalMultilinearSeries.comp, compAlongComposition, ContinuousMultilinearMap.compAlongComposition_apply, ContinuousMultilinearMap.sum_apply] refine Finset.sum_congr rfl fun c _hc => ?_ rw [removeZero_of_pos _ (c.length_pos_of_pos hn)] @[simp] theorem comp_removeZero (q : FormalMultilinearSeries 𝕜 F G) (p : FormalMultilinearSeries 𝕜 E F) : q.comp p.removeZero = q.comp p := by ext n; simp [FormalMultilinearSeries.comp] end FormalMultilinearSeries end Topological variable [NontriviallyNormedField 𝕜] [NormedAddCommGroup E] [NormedSpace 𝕜 E] [NormedAddCommGroup F] [NormedSpace 𝕜 F] [NormedAddCommGroup G] [NormedSpace 𝕜 G] [NormedAddCommGroup H] [NormedSpace 𝕜 H] namespace FormalMultilinearSeries /-- The norm of `f.compAlongComposition p c` is controlled by the product of the norms of the relevant bits of `f` and `p`. -/ theorem compAlongComposition_bound {n : ℕ} (p : FormalMultilinearSeries 𝕜 E F) (c : Composition n) (f : F [×c.length]→L[𝕜] G) (v : Fin n → E) : ‖f.compAlongComposition p c v‖ ≤ (‖f‖ * ∏ i, ‖p (c.blocksFun i)‖) * ∏ i : Fin n, ‖v i‖ := calc ‖f.compAlongComposition p c v‖ = ‖f (p.applyComposition c v)‖ := rfl _ ≤ ‖f‖ * ∏ i, ‖p.applyComposition c v i‖ := ContinuousMultilinearMap.le_opNorm _ _ _ ≤ ‖f‖ * ∏ i, ‖p (c.blocksFun i)‖ * ∏ j : Fin (c.blocksFun i), ‖(v ∘ c.embedding i) j‖ := by apply mul_le_mul_of_nonneg_left _ (norm_nonneg _) refine Finset.prod_le_prod (fun i _hi => norm_nonneg _) fun i _hi => ?_ apply ContinuousMultilinearMap.le_opNorm _ = (‖f‖ * ∏ i, ‖p (c.blocksFun i)‖) * ∏ i, ∏ j : Fin (c.blocksFun i), ‖(v ∘ c.embedding i) j‖ := by rw [Finset.prod_mul_distrib, mul_assoc] _ = (‖f‖ * ∏ i, ‖p (c.blocksFun i)‖) * ∏ i : Fin n, ‖v i‖ := by rw [← c.blocksFinEquiv.prod_comp, ← Finset.univ_sigma_univ, Finset.prod_sigma] congr /-- The norm of `q.compAlongComposition p c` is controlled by the product of the norms of the relevant bits of `q` and `p`. -/ theorem compAlongComposition_norm {n : ℕ} (q : FormalMultilinearSeries 𝕜 F G) (p : FormalMultilinearSeries 𝕜 E F) (c : Composition n) : ‖q.compAlongComposition p c‖ ≤ ‖q c.length‖ * ∏ i, ‖p (c.blocksFun i)‖ := ContinuousMultilinearMap.opNorm_le_bound (by positivity) (compAlongComposition_bound _ _ _) theorem compAlongComposition_nnnorm {n : ℕ} (q : FormalMultilinearSeries 𝕜 F G) (p : FormalMultilinearSeries 𝕜 E F) (c : Composition n) : ‖q.compAlongComposition p c‖₊ ≤ ‖q c.length‖₊ * ∏ i, ‖p (c.blocksFun i)‖₊ := by rw [← NNReal.coe_le_coe]; push_cast; exact q.compAlongComposition_norm p c /-! ### The identity formal power series We will now define the identity power series, and show that it is a neutral element for left and right composition. -/ section variable (𝕜 E) /-- The identity formal multilinear series, with all coefficients equal to `0` except for `n = 1` where it is (the continuous multilinear version of) the identity. We allow an arbitrary constant coefficient `x`. -/ def id (x : E) : FormalMultilinearSeries 𝕜 E E \| 0 => ContinuousMultilinearMap.uncurry0 𝕜 _ x \| 1 => (continuousMultilinearCurryFin1 𝕜 E E).symm (ContinuousLinearMap.id 𝕜 E) \| _ => 0 @[simp] theorem id_apply_zero (x : E) (v : Fin 0 → E) : (FormalMultilinearSeries.id 𝕜 E x) 0 v = x := rfl /-- The first coefficient of `id 𝕜 E` is the identity. -/ @[simp] theorem id_apply_one (x : E) (v : Fin 1 → E) : (FormalMultilinearSeries.id 𝕜 E x) 1 v = v 0 := rfl /-- The `n`th coefficient of `id 𝕜 E` is the identity when `n = 1`. We state this in a dependent way, as it will often appear in this form. -/ theorem id_apply_one' (x : E) {n : ℕ} (h : n = 1) (v : Fin n → E) : (id 𝕜 E x) n v = v ⟨0, h.symm ▸ zero_lt_one⟩ := by subst n apply id_apply_one /-- For `n ≠ 1`, the `n`-th coefficient of `id 𝕜 E` is zero, by definition. -/ @[simp] theorem id_apply_of_one_lt (x : E) {n : ℕ} (h : 1 < n) : (FormalMultilinearSeries.id 𝕜 E x) n = 0 := by match n with \| 0 => contradiction \| 1 => contradiction \| n + 2 => rfl end @[simp] theorem comp_id (p : FormalMultilinearSeries 𝕜 E F) (x : E) : p.comp (id 𝕜 E x) = p := by ext1 n dsimp [FormalMultilinearSeries.comp] rw [Finset.sum_eq_single (Composition.ones n)] · show compAlongComposition p (id 𝕜 E x) (Composition.ones n) = p n ext v rw [compAlongComposition_apply] apply p.congr (Composition.ones_length n) intros rw [applyComposition_ones] refine congr_arg v ?_ rw [Fin.ext_iff, Fin.coe_castLE, Fin.val_mk] · show ∀ b : Composition n, b ∈ Finset.univ → b ≠ Composition.ones n → compAlongComposition p (id 𝕜 E x) b = 0 intro b _ hb obtain ⟨k, hk, lt_k⟩ : ∃ (k : ℕ), k ∈ Composition.blocks b ∧ 1 < k := Composition.ne_ones_iff.1 hb obtain ⟨i, hi⟩ : ∃ (i : Fin b.blocks.length), b.blocks[i] = k := List.get_of_mem hk let j : Fin b.length := ⟨i.val, b.blocks_length ▸ i.prop⟩ have A : 1 < b.blocksFun j := by convert lt_k ext v rw [compAlongComposition_apply, ContinuousMultilinearMap.zero_apply] apply ContinuousMultilinearMap.map_coord_zero _ j dsimp [applyComposition] rw [id_apply_of_one_lt _ _ _ A, ContinuousMultilinearMap.zero_apply] · simp @[simp] theorem id_comp (p : FormalMultilinearSeries 𝕜 E F) (v0 : Fin 0 → E) : (id 𝕜 F (p 0 v0)).comp p = p := by ext1 n obtain rfl \| n_pos := n.eq_zero_or_pos · ext v simp only [comp_coeff_zero', id_apply_zero] congr with i exact i.elim0 · dsimp [FormalMultilinearSeries.comp] rw [Finset.sum_eq_single (Composition.single n n_pos)] · show compAlongComposition (id 𝕜 F (p 0 v0)) p (Composition.single n n_pos) = p n ext v rw [compAlongComposition_apply, id_apply_one' _ _ _ (Composition.single_length n_pos)] dsimp [applyComposition] refine p.congr rfl fun i him hin => congr_arg v <\| ?_ ext; simp · show ∀ b : Composition n, b ∈ Finset.univ → b ≠ Composition.single n n_pos → compAlongComposition (id 𝕜 F (p 0 v0)) p b = 0 intro b _ hb have A : 1 < b.length := by have : b.length ≠ 1 := by simpa [Composition.eq_single_iff_length] using hb have : 0 < b.length := Composition.length_pos_of_pos b n_pos omega ext v rw [compAlongComposition_apply, id_apply_of_one_lt _ _ _ A, ContinuousMultilinearMap.zero_apply, ContinuousMultilinearMap.zero_apply] · simp /-- Variant of `id_comp` in which the zero coefficient is given by an equality hypothesis instead of a definitional equality. Useful for rewriting or simplifying out in some situations. -/ theorem id_comp' (p : FormalMultilinearSeries 𝕜 E F) (x : F) (v0 : Fin 0 → E) (h : x = p 0 v0) : (id 𝕜 F x).comp p = p := by simp [h] /-! ### Summability properties of the composition of formal power series -/ section /-- If two formal multilinear series have positive radius of convergence, then the terms appearing in the definition of their composition are also summable (when multiplied by a suitable positive geometric term). -/ theorem comp_summable_nnreal (q : FormalMultilinearSeries 𝕜 F G) (p : FormalMultilinearSeries 𝕜 E F) (hq : 0 < q.radius) (hp : 0 < p.radius) : ∃ r > (0 : ℝ≥0), Summable fun i : Σ n, Composition n => ‖q.compAlongComposition p i.2‖₊ * r ^ i.1 := by /- This follows from the fact that the growth rate of `‖qₙ‖` and `‖pₙ‖` is at most geometric, giving a geometric bound on each `‖q.compAlongComposition p op‖`, together with the fact that there are `2^(n-1)` compositions of `n`, giving at most a geometric loss. -/ rcases ENNReal.lt_iff_exists_nnreal_btwn.1 (lt_min zero_lt_one hq) with ⟨rq, rq_pos, hrq⟩ rcases ENNReal.lt_iff_exists_nnreal_btwn.1 (lt_min zero_lt_one hp) with ⟨rp, rp_pos, hrp⟩ simp only [lt_min_iff, ENNReal.coe_lt_one_iff, ENNReal.coe_pos] at hrp hrq rp_pos rq_pos obtain ⟨Cq, _hCq0, hCq⟩ : ∃ Cq > 0, ∀ n, ‖q n‖₊ * rq ^ n ≤ Cq := q.nnnorm_mul_pow_le_of_lt_radius hrq.2 obtain ⟨Cp, hCp1, hCp⟩ : ∃ Cp ≥ 1, ∀ n, ‖p n‖₊ * rp ^ n ≤ Cp := by rcases p.nnnorm_mul_pow_le_of_lt_radius hrp.2 with ⟨Cp, -, hCp⟩ exact ⟨max Cp 1, le_max_right _ _, fun n => (hCp n).trans (le_max_left _ _)⟩ let r0 : ℝ≥0 := (4 * Cp)⁻¹ have r0_pos : 0 < r0 := inv_pos.2 (mul_pos zero_lt_four (zero_lt_one.trans_le hCp1)) set r : ℝ≥0 := rp * rq * r0 have r_pos : 0 < r := mul_pos (mul_pos rp_pos rq_pos) r0_pos have I : ∀ i : Σ n : ℕ, Composition n, ‖q.compAlongComposition p i.2‖₊ * r ^ i.1 ≤ Cq / 4 ^ i.1 := by rintro ⟨n, c⟩ have A := calc ‖q c.length‖₊ * rq ^ n ≤ ‖q c.length‖₊ * rq ^ c.length := mul_le_mul' le_rfl (pow_le_pow_of_le_one rq.2 hrq.1.le c.length_le) _ ≤ Cq := hCq _ have B := calc (∏ i, ‖p (c.blocksFun i)‖₊) * rp ^ n = ∏ i, ‖p (c.blocksFun i)‖₊ * rp ^ c.blocksFun i := by simp only [Finset.prod_mul_distrib, Finset.prod_pow_eq_pow_sum, c.sum_blocksFun] _ ≤ ∏ _i : Fin c.length, Cp := Finset.prod_le_prod' fun i _ => hCp _ _ = Cp ^ c.length := by simp _ ≤ Cp ^ n := pow_right_mono₀ hCp1 c.length_le calc ‖q.compAlongComposition p c‖₊ * r ^ n ≤ (‖q c.length‖₊ * ∏ i, ‖p (c.blocksFun i)‖₊) * r ^ n := mul_le_mul' (q.compAlongComposition_nnnorm p c) le_rfl _ = ‖q c.length‖₊ * rq ^ n * ((∏ i, ‖p (c.blocksFun i)‖₊) * rp ^ n) * r0 ^ n := by ring _ ≤ Cq * Cp ^ n * r0 ^ n := mul_le_mul' (mul_le_mul' A B) le_rfl _ = Cq / 4 ^ n := by simp only [r0] field_simp [mul_pow, (zero_lt_one.trans_le hCp1).ne'] ring refine ⟨r, r_pos, NNReal.summable_of_le I ?_⟩ simp_rw [div_eq_mul_inv] refine Summable.mul_left _ ?_ have : ∀ n : ℕ, HasSum (fun c : Composition n => (4 ^ n : ℝ≥0)⁻¹) (2 ^ (n - 1) / 4 ^ n) := by intro n convert hasSum_fintype fun c : Composition n => (4 ^ n : ℝ≥0)⁻¹ simp [Finset.card_univ, composition_card, div_eq_mul_inv] refine NNReal.summable_sigma.2 ⟨fun n => (this n).summable, (NNReal.summable_nat_add_iff 1).1 ?_⟩ convert (NNReal.summable_geometric (NNReal.div_lt_one_of_lt one_lt_two)).mul_left (1 / 4) using 1 ext1 n rw [(this _).tsum_eq, add_tsub_cancel_right] field_simp [← mul_assoc, pow_succ, mul_pow, show (4 : ℝ≥0) = 2 * 2 by norm_num, mul_right_comm] end /-- Bounding below the radius of the composition of two formal multilinear series assuming summability over all compositions. -/ theorem le_comp_radius_of_summable (q : FormalMultilinearSeries 𝕜 F G) (p : FormalMultilinearSeries 𝕜 E F) (r : ℝ≥0) (hr : Summable fun i : Σ n, Composition n => ‖q.compAlongComposition p i.2‖₊ * r ^ i.1) : (r : ℝ≥0∞) ≤ (q.comp p).radius := by refine le_radius_of_bound_nnreal _ (∑' i : Σ n, Composition n, ‖compAlongComposition q p i.snd‖₊ * r ^ i.fst) fun n => ?_ calc ‖FormalMultilinearSeries.comp q p n‖₊ * r ^ n ≤ ∑' c : Composition n, ‖compAlongComposition q p c‖₊ * r ^ n := by rw [tsum_fintype, ← Finset.sum_mul] exact mul_le_mul' (nnnorm_sum_le _ _) le_rfl _ ≤ ∑' i : Σ n : ℕ, Composition n, ‖compAlongComposition q p i.snd‖₊ * r ^ i.fst := NNReal.tsum_comp_le_tsum_of_inj hr sigma_mk_injective /-! ### Composing analytic functions Now, we will prove that the composition of the partial sums of `q` and `p` up to order `N` is given by a sum over some large subset of `Σ n, Composition n` of `q.compAlongComposition p`, to deduce that the series for `q.comp p` indeed converges to `g ∘ f` when `q` is a power series for `g` and `p` is a power series for `f`. This proof is a big reindexing argument of a sum. Since it is a bit involved, we define first the source of the change of variables (`compPartialSumSource`), its target (`compPartialSumTarget`) and the change of variables itself (`compChangeOfVariables`) before giving the main statement in `comp_partialSum`. -/ /-- Source set in the change of variables to compute the composition of partial sums of formal power series. See also `comp_partialSum`. -/ def compPartialSumSource (m M N : ℕ) : Finset (Σ n, Fin n → ℕ) := Finset.sigma (Finset.Ico m M) (fun n : ℕ => Fintype.piFinset fun _i : Fin n => Finset.Ico 1 N :) @[simp] theorem mem_compPartialSumSource_iff (m M N : ℕ) (i : Σ n, Fin n → ℕ) : i ∈ compPartialSumSource m M N ↔ (m ≤ i.1 ∧ i.1 < M) ∧ ∀ a : Fin i.1, 1 ≤ i.2 a ∧ i.2 a < N := by simp only [compPartialSumSource, Finset.mem_Ico, Fintype.mem_piFinset, Finset.mem_sigma] /-- Change of variables appearing to compute the composition of partial sums of formal power series -/ def compChangeOfVariables (m M N : ℕ) (i : Σ n, Fin n → ℕ) (hi : i ∈ compPartialSumSource m M N) : Σ n, Composition n := by rcases i with ⟨n, f⟩ rw [mem_compPartialSumSource_iff] at hi refine ⟨∑ j, f j, ofFn fun a => f a, fun {i} hi' => ?_, by simp [sum_ofFn]⟩ obtain ⟨j, rfl⟩ : ∃ j : Fin n, f j = i := by rwa [mem_ofFn', Set.mem_range] at hi' exact (hi.2 j).1 @[simp] theorem compChangeOfVariables_length (m M N : ℕ) {i : Σ n, Fin n → ℕ} (hi : i ∈ compPartialSumSource m M N) : Composition.length (compChangeOfVariables m M N i hi).2 = i.1 := by rcases i with ⟨k, blocks_fun⟩ dsimp [compChangeOfVariables] simp only [Composition.length, map_ofFn, length_ofFn] theorem compChangeOfVariables_blocksFun (m M N : ℕ) {i : Σ n, Fin n → ℕ} (hi : i ∈ compPartialSumSource m M N) (j : Fin i.1) : (compChangeOfVariables m M N i hi).2.blocksFun ⟨j, (compChangeOfVariables_length m M N hi).symm ▸ j.2⟩ = i.2 j := by rcases i with ⟨n, f⟩ dsimp [Composition.blocksFun, Composition.blocks, compChangeOfVariables] simp only [map_ofFn, List.getElem_ofFn, Function.comp_apply] /-- Target set in the change of variables to compute the composition of partial sums of formal power series, here given a a set. -/ def compPartialSumTargetSet (m M N : ℕ) : Set (Σ n, Composition n) := {i \| m ≤ i.2.length ∧ i.2.length < M ∧ ∀ j : Fin i.2.length, i.2.blocksFun j < N} theorem compPartialSumTargetSet_image_compPartialSumSource (m M N : ℕ) (i : Σ n, Composition n) (hi : i ∈ compPartialSumTargetSet m M N) : ∃ (j : _) (hj : j ∈ compPartialSumSource m M N), compChangeOfVariables m M N j hj = i := by rcases i with ⟨n, c⟩ refine ⟨⟨c.length, c.blocksFun⟩, ?_, ?_⟩ · simp only [compPartialSumTargetSet, Set.mem_setOf_eq] at hi simp only [mem_compPartialSumSource_iff, hi.left, hi.right, true_and, and_true] exact fun a => c.one_le_blocks' _ · dsimp [compChangeOfVariables] rw [Composition.sigma_eq_iff_blocks_eq] simp only [Composition.blocksFun, Composition.blocks, Subtype.coe_eta] conv_rhs => rw [← List.ofFn_get c.blocks] /-- Target set in the change of variables to compute the composition of partial sums of formal power series, here given a a finset. See also `comp_partialSum`. -/ def compPartialSumTarget (m M N : ℕ) : Finset (Σ n, Composition n) := Set.Finite.toFinset <\| ((Finset.finite_toSet _).dependent_image _).subset <\| compPartialSumTargetSet_image_compPartialSumSource m M N @[simp] theorem mem_compPartialSumTarget_iff {m M N : ℕ} {a : Σ n, Composition n} : a ∈ compPartialSumTarget m M N ↔ m ≤ a.2.length ∧ a.2.length < M ∧ ∀ j : Fin a.2.length, a.2.blocksFun j < N := by simp [compPartialSumTarget, compPartialSumTargetSet] /-- `compChangeOfVariables m M N` is a bijection between `compPartialSumSource m M N` and `compPartialSumTarget m M N`, yielding equal sums for functions that correspond to each other under the bijection. As `compChangeOfVariables m M N` is a dependent function, stating that it is a bijection is not directly possible, but the consequence on sums can be stated more easily. -/ theorem compChangeOfVariables_sum {α : Type} [AddCommMonoid α] (m M N : ℕ) (f : (Σ n : ℕ, Fin n → ℕ) → α) (g : (Σ n, Composition n) → α) (h : ∀ (e) (he : e ∈ compPartialSumSource m M N), f e = g (compChangeOfVariables m M N e he)) : ∑ e ∈ compPartialSumSource m M N, f e = ∑ e ∈ compPartialSumTarget m M N, g e := by apply Finset.sum_bij (compChangeOfVariables m M N) -- We should show that the correspondence we have set up is indeed a bijection -- between the index sets of the two sums. -- 1 - show that the image belongs to `compPartialSumTarget m N N` · rintro ⟨k, blocks_fun⟩ H rw [mem_compPartialSumSource_iff] at H simp only [mem_compPartialSumTarget_iff, Composition.length, Composition.blocks, H.left, map_ofFn, length_ofFn, true_and, compChangeOfVariables] intro j simp only [Composition.blocksFun, (H.right _).right, List.get_ofFn] -- 2 - show that the map is injective · rintro ⟨k, blocks_fun⟩ H ⟨k', blocks_fun'⟩ H' heq obtain rfl : k = k' := by have := (compChangeOfVariables_length m M N H).symm rwa [heq, compChangeOfVariables_length] at this congr funext i calc blocks_fun i = (compChangeOfVariables m M N _ H).2.blocksFun _ := (compChangeOfVariables_blocksFun m M N H i).symm _ = (compChangeOfVariables m M N _ H').2.blocksFun _ := by apply Composition.blocksFun_congr <;> first \| rw [heq] \| rfl _ = blocks_fun' i := compChangeOfVariables_blocksFun m M N H' i -- 3 - show that the map is surjective · intro i hi apply compPartialSumTargetSet_image_compPartialSumSource m M N i simpa [compPartialSumTarget] using hi -- 4 - show that the composition gives the `compAlongComposition` application · rintro ⟨k, blocks_fun⟩ H rw [h] /-- The auxiliary set corresponding to the composition of partial sums asymptotically contains all possible compositions. -/ theorem compPartialSumTarget_tendsto_prod_atTop : Tendsto (fun (p : ℕ × ℕ) => compPartialSumTarget 0 p.1 p.2) atTop atTop := by apply Monotone.tendsto_atTop_finset · intro m n hmn a ha have : ∀ i, i < m.1 → i < n.1 := fun i hi => lt_of_lt_of_le hi hmn.1 have : ∀ i, i < m.2 → i < n.2 := fun i hi => lt_of_lt_of_le hi hmn.2 aesop · rintro ⟨n, c⟩ simp only [mem_compPartialSumTarget_iff] obtain ⟨n, hn⟩ : BddAbove ((Finset.univ.image fun i : Fin c.length => c.blocksFun i) : Set ℕ) := Finset.bddAbove _ refine ⟨max n c.length + 1, bot_le, lt_of_le_of_lt (le_max_right n c.length) (lt_add_one _), fun j => lt_of_le_of_lt (le_trans ?_ (le_max_left _ _)) (lt_add_one _)⟩ apply hn simp only [Finset.mem_image_of_mem, Finset.mem_coe, Finset.mem_univ] /-- The auxiliary set corresponding to the composition of partial sums asymptotically contains all possible compositions. -/ theorem compPartialSumTarget_tendsto_atTop : Tendsto (fun N => compPartialSumTarget 0 N N) atTop atTop := by apply Tendsto.comp compPartialSumTarget_tendsto_prod_atTop tendsto_atTop_diagonal /-- Composing the partial sums of two multilinear series coincides with the sum over all compositions in `compPartialSumTarget 0 N N`. This is precisely the motivation for the definition of `compPartialSumTarget`. -/ theorem comp_partialSum (q : FormalMultilinearSeries 𝕜 F G) (p : FormalMultilinearSeries 𝕜 E F) (M N : ℕ) (z : E) : q.partialSum M (∑ i ∈ Finset.Ico 1 N, p i fun _j => z) = ∑ i ∈ compPartialSumTarget 0 M N, q.compAlongComposition p i.2 fun _j => z := by -- we expand the composition, using the multilinearity of `q` to expand along each coordinate. suffices H : (∑ n ∈ Finset.range M, ∑ r ∈ Fintype.piFinset fun i : Fin n => Finset.Ico 1 N, q n fun i : Fin n => p (r i) fun _j => z) = ∑ i ∈ compPartialSumTarget 0 M N, q.compAlongComposition p i.2 fun _j => z by simpa only [FormalMultilinearSeries.partialSum, ContinuousMultilinearMap.map_sum_finset] using H -- rewrite the first sum as a big sum over a sigma type, in the finset -- `compPartialSumTarget 0 N N` rw [Finset.range_eq_Ico, Finset.sum_sigma'] -- use `compChangeOfVariables_sum`, saying that this change of variables respects sums apply compChangeOfVariables_sum 0 M N rintro ⟨k, blocks_fun⟩ H apply congr _ (compChangeOfVariables_length 0 M N H).symm intros rw [← compChangeOfVariables_blocksFun 0 M N H, applyComposition, Function.comp_def] end FormalMultilinearSeries open FormalMultilinearSeries /-- If two functions `g` and `f` have power series `q` and `p` respectively at `f x` and `x`, within two sets `s` and `t` such that `f` maps `s` to `t`, then `g ∘ f` admits the power series `q.comp p` at `x` within `s`. -/ theorem HasFPowerSeriesWithinAt.comp {g : F → G} {f : E → F} {q : FormalMultilinearSeries 𝕜 F G} {p : FormalMultilinearSeries 𝕜 E F} {x : E} {t : Set F} {s : Set E} (hg : HasFPowerSeriesWithinAt g q t (f x)) (hf : HasFPowerSeriesWithinAt f p s x) (hs : Set.MapsTo f s t) : HasFPowerSeriesWithinAt (g ∘ f) (q.comp p) s x := by /- Consider `rf` and `rg` such that `f` and `g` have power series expansion on the disks of radius `rf` and `rg`. -/ rcases hg with ⟨rg, Hg⟩ rcases hf with ⟨rf, Hf⟩ -- The terms defining `q.comp p` are geometrically summable in a disk of some radius `r`. rcases q.comp_summable_nnreal p Hg.radius_pos Hf.radius_pos with ⟨r, r_pos : 0 < r, hr⟩ /- We will consider `y` which is smaller than `r` and `rf`, and also small enough that `f (x + y)` is close enough to `f x` to be in the disk where `g` is well behaved. Let `min (r, rf, δ)` be this new radius. -/ obtain ⟨δ, δpos, hδ⟩ : ∃ δ : ℝ≥0∞, 0 < δ ∧ ∀ {z : E}, z ∈ insert x s ∩ EMetric.ball x δ → f z ∈ insert (f x) t ∩ EMetric.ball (f x) rg := by have : insert (f x) t ∩ EMetric.ball (f x) rg ∈ 𝓝[insert (f x) t] (f x) := by apply inter_mem_nhdsWithin exact EMetric.ball_mem_nhds _ Hg.r_pos have := Hf.analyticWithinAt.continuousWithinAt_insert.tendsto_nhdsWithin (hs.insert x) this rcases EMetric.mem_nhdsWithin_iff.1 this with ⟨δ, δpos, Hδ⟩ exact ⟨δ, δpos, fun {z} hz => Hδ (by rwa [Set.inter_comm])⟩ let rf' := min rf δ have min_pos : 0 < min rf' r := by simp only [rf', r_pos, Hf.r_pos, δpos, lt_min_iff, ENNReal.coe_pos, and_self_iff] /- We will show that `g ∘ f` admits the power series `q.comp p` in the disk of radius `min (r, rf', δ)`. -/ refine ⟨min rf' r, ?_⟩ refine ⟨le_trans (min_le_right rf' r) (FormalMultilinearSeries.le_comp_radius_of_summable q p r hr), min_pos, fun {y} h'y hy ↦ ?_⟩ /- Let `y` satisfy `‖y‖ < min (r, rf', δ)`. We want to show that `g (f (x + y))` is the sum of `q.comp p` applied to `y`. -/ -- First, check that `y` is small enough so that estimates for `f` and `g` apply. have y_mem : y ∈ EMetric.ball (0 : E) rf := (EMetric.ball_subset_ball (le_trans (min_le_left _ _) (min_le_left _ _))) hy have fy_mem : f (x + y) ∈ insert (f x) t ∩ EMetric.ball (f x) rg := by apply hδ have : y ∈ EMetric.ball (0 : E) δ := (EMetric.ball_subset_ball (le_trans (min_le_left _ _) (min_le_right _ _))) hy simpa [-Set.mem_insert_iff, edist_eq_enorm_sub, h'y] /- Now the proof starts. To show that the sum of `q.comp p` at `y` is `g (f (x + y))`, we will write `q.comp p` applied to `y` as a big sum over all compositions. Since the sum is summable, to get its convergence it suffices to get the convergence along some increasing sequence of sets. We will use the sequence of sets `compPartialSumTarget 0 n n`, along which the sum is exactly the composition of the partial sums of `q` and `p`, by design. To show that it converges to `g (f (x + y))`, pointwise convergence would not be enough, but we have uniform convergence to save the day. -/ -- First step: the partial sum of `p` converges to `f (x + y)`. have A : Tendsto (fun n ↦ (n, ∑ a ∈ Finset.Ico 1 n, p a fun _ ↦ y)) atTop (atTop ×ˢ 𝓝 (f (x + y) - f x)) := by apply Tendsto.prodMk tendsto_id have L : ∀ᶠ n in atTop, (∑ a ∈ Finset.range n, p a fun _b ↦ y) - f x = ∑ a ∈ Finset.Ico 1 n, p a fun _b ↦ y := by rw [eventually_atTop] refine ⟨1, fun n hn => ?_⟩ symm rw [eq_sub_iff_add_eq', Finset.range_eq_Ico, ← Hf.coeff_zero fun _i => y, Finset.sum_eq_sum_Ico_succ_bot hn] have : Tendsto (fun n => (∑ a ∈ Finset.range n, p a fun _b => y) - f x) atTop (𝓝 (f (x + y) - f x)) := (Hf.hasSum h'y y_mem).tendsto_sum_nat.sub tendsto_const_nhds exact Tendsto.congr' L this -- Second step: the composition of the partial sums of `q` and `p` converges to `g (f (x + y))`. have B : Tendsto (fun n => q.partialSum n (∑ a ∈ Finset.Ico 1 n, p a fun _b ↦ y)) atTop (𝓝 (g (f (x + y)))) := by -- we use the fact that the partial sums of `q` converge to `g (f (x + y))`, uniformly on a -- neighborhood of `f (x + y)`. have : Tendsto (fun (z : ℕ × F) ↦ q.partialSum z.1 z.2) (atTop ×ˢ 𝓝 (f (x + y) - f x)) (𝓝 (g (f x + (f (x + y) - f x)))) := by apply Hg.tendsto_partialSum_prod (y := f (x + y) - f x) · simpa [edist_eq_enorm_sub] using fy_mem.2 · simpa using fy_mem.1 simpa using this.comp A -- Third step: the sum over all compositions in `compPartialSumTarget 0 n n` converges to -- `g (f (x + y))`. As this sum is exactly the composition of the partial sum, this is a direct -- consequence of the second step have C : Tendsto (fun n => ∑ i ∈ compPartialSumTarget 0 n n, q.compAlongComposition p i.2 fun _j => y) atTop (𝓝 (g (f (x + y)))) := by simpa [comp_partialSum] using B -- Fourth step: the sum over all compositions is `g (f (x + y))`. This follows from the -- convergence along a subsequence proved in the third step, and the fact that the sum is Cauchy -- thanks to the summability properties. have D : HasSum (fun i : Σ n, Composition n => q.compAlongComposition p i.2 fun _j => y) (g (f (x + y))) := haveI cau : CauchySeq fun s : Finset (Σ n, Composition n) => ∑ i ∈ s, q.compAlongComposition p i.2 fun _j => y := by apply cauchySeq_finset_of_norm_bounded _ (NNReal.summable_coe.2 hr) _ simp only [coe_nnnorm, NNReal.coe_mul, NNReal.coe_pow] rintro ⟨n, c⟩ calc ‖(compAlongComposition q p c) fun _j : Fin n => y‖ ≤ ‖compAlongComposition q p c‖ ∏ _j : Fin n, ‖y‖ := by apply ContinuousMultilinearMap.le_opNorm _ ≤ ‖compAlongComposition q p c‖ * (r : ℝ) ^ n := by rw [Finset.prod_const, Finset.card_fin] gcongr rw [EMetric.mem_ball, edist_zero_eq_enorm] at hy have := le_trans (le_of_lt hy) (min_le_right _ _) rwa [enorm_le_coe, ← NNReal.coe_le_coe, coe_nnnorm] at this tendsto_nhds_of_cauchySeq_of_subseq cau compPartialSumTarget_tendsto_atTop C -- Fifth step: the sum over `n` of `q.comp p n` can be expressed as a particular resummation of -- the sum over all compositions, by grouping together the compositions of the same -- integer `n`. The convergence of the whole sum therefore implies the converence of the sum -- of `q.comp p n` have E : HasSum (fun n => (q.comp p) n fun _j => y) (g (f (x + y))) := by apply D.sigma intro n simp only [compAlongComposition_apply, FormalMultilinearSeries.comp, ContinuousMultilinearMap.sum_apply] exact hasSum_fintype _ rw [Function.comp_apply] exact E /-- If two functions `g` and `f` have power series `q` and `p` respectively at `f x` and `x`, then `g ∘ f` admits the power series `q.comp p` at `x` within `s`. -/ theorem HasFPowerSeriesAt.comp {g : F → G} {f : E → F} {q : FormalMultilinearSeries 𝕜 F G} {p : FormalMultilinearSeries 𝕜 E F} {x : E} (hg : HasFPowerSeriesAt g q (f x)) (hf : HasFPowerSeriesAt f p x) : HasFPowerSeriesAt (g ∘ f) (q.comp p) x := by rw [← hasFPowerSeriesWithinAt_univ] at hf hg ⊢ apply hg.comp hf (by simp) /-- If two functions `g` and `f` are analytic respectively at `f x` and `x`, within two sets `s` and `t` such that `f` maps `s` to `t`, then `g ∘ f` is analytic at `x` within `s`. -/ theorem AnalyticWithinAt.comp {g : F → G} {f : E → F} {x : E} {t : Set F} {s : Set E} (hg : AnalyticWithinAt 𝕜 g t (f x)) (hf : AnalyticWithinAt 𝕜 f s x) (h : Set.MapsTo f s t) : AnalyticWithinAt 𝕜 (g ∘ f) s x := by let ⟨_q, hq⟩ := hg let ⟨_p, hp⟩ := hf exact (hq.comp hp h).analyticWithinAt /-- Version of `AnalyticWithinAt.comp` where point equality is a separate hypothesis. -/ theorem AnalyticWithinAt.comp_of_eq {g : F → G} {f : E → F} {y : F} {x : E} {t : Set F} {s : Set E} (hg : AnalyticWithinAt 𝕜 g t y) (hf : AnalyticWithinAt 𝕜 f s x) (h : Set.MapsTo f s t) (hy : f x = y) : AnalyticWithinAt 𝕜 (g ∘ f) s x := by rw [← hy] at hg exact hg.comp hf h lemma AnalyticOn.comp {f : F → G} {g : E → F} {s : Set F} {t : Set E} (hf : AnalyticOn 𝕜 f s) (hg : AnalyticOn 𝕜 g t) (h : Set.MapsTo g t s) : AnalyticOn 𝕜 (f ∘ g) t := fun x m ↦ (hf _ (h m)).comp (hg x m) h /-- If two functions `g` and `f` are analytic respectively at `f x` and `x`, then `g ∘ f` is analytic at `x`. -/ @[fun_prop] theorem AnalyticAt.comp {g : F → G} {f : E → F} {x : E} (hg : AnalyticAt 𝕜 g (f x)) (hf : AnalyticAt 𝕜 f x) : AnalyticAt 𝕜 (g ∘ f) x := by rw [← analyticWithinAt_univ] at hg hf ⊢ apply hg.comp hf (by simp) /-- If two functions `g` and `f` are analytic respectively at `f x` and `x`, then `g ∘ f` is analytic at `x`. -/ @[fun_prop] theorem AnalyticAt.comp' {g : F → G} {f : E → F} {x : E} (hg : AnalyticAt 𝕜 g (f x)) (hf : AnalyticAt 𝕜 f x) : AnalyticAt 𝕜 (fun z ↦ g (f z)) x := hg.comp hf /-- Version of `AnalyticAt.comp` where point equality is a separate hypothesis. -/ theorem AnalyticAt.comp_of_eq {g : F → G} {f : E → F} {y : F} {x : E} (hg : AnalyticAt 𝕜 g y) (hf : AnalyticAt 𝕜 f x) (hy : f x = y) : AnalyticAt 𝕜 (g ∘ f) x := by rw [← hy] at hg exact hg.comp hf /-- Version of `AnalyticAt.comp` where point equality is a separate hypothesis. -/ theorem AnalyticAt.comp_of_eq' {g : F → G} {f : E → F} {y : F} {x : E} (hg : AnalyticAt 𝕜 g y) (hf : AnalyticAt 𝕜 f x) (hy : f x = y) : AnalyticAt 𝕜 (fun z ↦ g (f z)) x := by apply hg.comp_of_eq hf hy theorem AnalyticAt.comp_analyticWithinAt {g : F → G} {f : E → F} {x : E} {s : Set E} (hg : AnalyticAt 𝕜 g (f x)) (hf : AnalyticWithinAt 𝕜 f s x) : AnalyticWithinAt 𝕜 (g ∘ f) s x := by rw [← analyticWithinAt_univ] at hg exact hg.comp hf (Set.mapsTo_univ _ _) theorem AnalyticAt.comp_analyticWithinAt_of_eq {g : F → G} {f : E → F} {x : E} {y : F} {s : Set E} (hg : AnalyticAt 𝕜 g y) (hf : AnalyticWithinAt 𝕜 f s x) (h : f x = y) : AnalyticWithinAt 𝕜 (g ∘ f) s x := by rw [← h] at hg exact hg.comp_analyticWithinAt hf /-- If two functions `g` and `f` are analytic respectively on `s.image f` and `s`, then `g ∘ f` is analytic on `s`. -/ theorem AnalyticOnNhd.comp' {s : Set E} {g : F → G} {f : E → F} (hg : AnalyticOnNhd 𝕜 g (s.image f)) (hf : AnalyticOnNhd 𝕜 f s) : AnalyticOnNhd 𝕜 (g ∘ f) s := fun z hz => (hg (f z) (Set.mem_image_of_mem f hz)).comp (hf z hz) theorem AnalyticOnNhd.comp {s : Set E} {t : Set F} {g : F → G} {f : E → F} (hg : AnalyticOnNhd 𝕜 g t) (hf : AnalyticOnNhd 𝕜 f s) (st : Set.MapsTo f s t) : AnalyticOnNhd 𝕜 (g ∘ f) s := comp' (mono hg (Set.mapsTo'.mp st)) hf lemma AnalyticOnNhd.comp_analyticOn {f : F → G} {g : E → F} {s : Set F} {t : Set E} (hf : AnalyticOnNhd 𝕜 f s) (hg : AnalyticOn 𝕜 g t) (h : Set.MapsTo g t s) : AnalyticOn 𝕜 (f ∘ g) t := fun x m ↦ (hf _ (h m)).comp_analyticWithinAt (hg x m) /-! ### Associativity of the composition of formal multilinear series In this paragraph, we prove the associativity of the composition of formal power series. By definition, ``` (r.comp q).comp p n v = ∑_{i₁ + ... + iₖ = n} (r.comp q)ₖ (p_{i₁} (v₀, ..., v_{i₁ -1}), p_{i₂} (...), ..., p_{iₖ}(...)) = ∑_{a : Composition n} (r.comp q) a.length (applyComposition p a v) ``` decomposing `r.comp q` in the same way, we get ``` (r.comp q).comp p n v = ∑_{a : Composition n} ∑_{b : Composition a.length} r b.length (applyComposition q b (applyComposition p a v)) ``` On the other hand, ``` r.comp (q.comp p) n v = ∑_{c : Composition n} r c.length (applyComposition (q.comp p) c v) ``` Here, `applyComposition (q.comp p) c v` is a vector of length `c.length`, whose `i`-th term is given by `(q.comp p) (c.blocksFun i) (v_l, v_{l+1}, ..., v_{m-1})` where `{l, ..., m-1}` is the `i`-th block in the composition `c`, of length `c.blocksFun i` by definition. To compute this term, we expand it as `∑_{dᵢ : Composition (c.blocksFun i)} q dᵢ.length (applyComposition p dᵢ v')`, where `v' = (v_l, v_{l+1}, ..., v_{m-1})`. Therefore, we get ``` r.comp (q.comp p) n v = ∑_{c : Composition n} ∑_{d₀ : Composition (c.blocksFun 0), ..., d_{c.length - 1} : Composition (c.blocksFun (c.length - 1))} r c.length (fun i ↦ q dᵢ.length (applyComposition p dᵢ v'ᵢ)) ``` To show that these terms coincide, we need to explain how to reindex the sums to put them in bijection (and then the terms we are summing will correspond to each other). Suppose we have a composition `a` of `n`, and a composition `b` of `a.length`. Then `b` indicates how to group together some blocks of `a`, giving altogether `b.length` blocks of blocks. These blocks of blocks can be called `d₀, ..., d_{a.length - 1}`, and one obtains a composition `c` of `n` by saying that each `dᵢ` is one single block. Conversely, if one starts from `c` and the `dᵢ`s, one can concatenate the `dᵢ`s to obtain a composition `a` of `n`, and register the lengths of the `dᵢ`s in a composition `b` of `a.length`. An example might be enlightening. Suppose `a = [2, 2, 3, 4, 2]`. It is a composition of length 5 of 13. The content of the blocks may be represented as `0011222333344`. Now take `b = [2, 3]` as a composition of `a.length = 5`. It says that the first 2 blocks of `a` should be merged, and the last 3 blocks of `a` should be merged, giving a new composition of `13` made of two blocks of length `4` and `9`, i.e., `c = [4, 9]`. But one can also remember that the new first block was initially made of two blocks of size `2`, so `d₀ = [2, 2]`, and the new second block was initially made of three blocks of size `3`, `4` and `2`, so `d₁ = [3, 4, 2]`. This equivalence is called `Composition.sigmaEquivSigmaPi n` below. We start with preliminary results on compositions, of a very specialized nature, then define the equivalence `Composition.sigmaEquivSigmaPi n`, and we deduce finally the associativity of composition of formal multilinear series in `FormalMultilinearSeries.comp_assoc`. -/ namespace Composition variable {n : ℕ} /-- Rewriting equality in the dependent type `Σ (a : Composition n), Composition a.length)` in non-dependent terms with lists, requiring that the blocks coincide. -/ theorem sigma_composition_eq_iff (i j : Σ a : Composition n, Composition a.length) : i = j ↔ i.1.blocks = j.1.blocks ∧ i.2.blocks = j.2.blocks := by refine ⟨by rintro rfl; exact ⟨rfl, rfl⟩, ?_⟩ rcases i with ⟨a, b⟩ rcases j with ⟨a', b'⟩ rintro ⟨h, h'⟩ obtain rfl : a = a' := by ext1; exact h obtain rfl : b = b' := by ext1; exact h' rfl /-- Rewriting equality in the dependent type `Σ (c : Composition n), Π (i : Fin c.length), Composition (c.blocksFun i)` in non-dependent terms with lists, requiring that the lists of blocks coincide. -/ theorem sigma_pi_composition_eq_iff (u v : Σ c : Composition n, ∀ i : Fin c.length, Composition (c.blocksFun i)) : u = v ↔ (ofFn fun i => (u.2 i).blocks) = ofFn fun i => (v.2 i).blocks := by refine ⟨fun H => by rw [H], fun H => ?_⟩ rcases u with ⟨a, b⟩ rcases v with ⟨a', b'⟩ dsimp at H obtain rfl : a = a' := by ext1 have : map List.sum (ofFn fun i : Fin (Composition.length a) => (b i).blocks) = map List.sum (ofFn fun i : Fin (Composition.length a') => (b' i).blocks) := by rw [H] simp only [map_ofFn] at this change (ofFn fun i : Fin (Composition.length a) => (b i).blocks.sum) = ofFn fun i : Fin (Composition.length a') => (b' i).blocks.sum at this simpa [Composition.blocks_sum, Composition.ofFn_blocksFun] using this ext1 · rfl · simp only [heq_eq_eq, ofFn_inj] at H ⊢ ext1 i	ext1 exact congrFun H i /-- When `a` is a composition of `n` and `b` is a composition of `a.length`, `a.gather b` is the	Mathlib/Analysis/Analytic/Composition.lean	996	999
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Devon Tuma -/ import Mathlib.Topology.Instances.ENNReal.Lemmas import Mathlib.MeasureTheory.Measure.Dirac /-! # Probability mass functions This file is about probability mass functions or discrete probability measures: a function `α → ℝ≥0∞` such that the values have (infinite) sum `1`. Construction of monadic `pure` and `bind` is found in `ProbabilityMassFunction/Monad.lean`, other constructions of `PMF`s are found in `ProbabilityMassFunction/Constructions.lean`. Given `p : PMF α`, `PMF.toOuterMeasure` constructs an `OuterMeasure` on `α`, by assigning each set the sum of the probabilities of each of its elements. Under this outer measure, every set is Carathéodory-measurable, so we can further extend this to a `Measure` on `α`, see `PMF.toMeasure`. `PMF.toMeasure.isProbabilityMeasure` shows this associated measure is a probability measure. Conversely, given a probability measure `μ` on a measurable space `α` with all singleton sets measurable, `μ.toPMF` constructs a `PMF` on `α`, setting the probability mass of a point `x` to be the measure of the singleton set `{x}`. ## Tags probability mass function, discrete probability measure -/ noncomputable section variable {α : Type*} open NNReal ENNReal MeasureTheory /-- A probability mass function, or discrete probability measures is a function `α → ℝ≥0∞` such that the values have (infinite) sum `1`. -/ def PMF.{u} (α : Type u) : Type u := { f : α → ℝ≥0∞ // HasSum f 1 } namespace PMF instance instFunLike : FunLike (PMF α) α ℝ≥0∞ where coe p a := p.1 a coe_injective' _ _ h := Subtype.eq h @[ext] protected theorem ext {p q : PMF α} (h : ∀ x, p x = q x) : p = q := DFunLike.ext p q h theorem hasSum_coe_one (p : PMF α) : HasSum p 1 := p.2 @[simp] theorem tsum_coe (p : PMF α) : ∑' a, p a = 1 := p.hasSum_coe_one.tsum_eq theorem tsum_coe_ne_top (p : PMF α) : ∑' a, p a ≠ ∞ := p.tsum_coe.symm ▸ ENNReal.one_ne_top theorem tsum_coe_indicator_ne_top (p : PMF α) (s : Set α) : ∑' a, s.indicator p a ≠ ∞ := ne_of_lt (lt_of_le_of_lt (ENNReal.tsum_le_tsum (fun _ => Set.indicator_apply_le fun _ => le_rfl)) (lt_of_le_of_ne le_top p.tsum_coe_ne_top)) @[simp] theorem coe_ne_zero (p : PMF α) : ⇑p ≠ 0 := fun hp => zero_ne_one ((tsum_zero.symm.trans (tsum_congr fun x => symm (congr_fun hp x))).trans p.tsum_coe) /-- The support of a `PMF` is the set where it is nonzero. -/ def support (p : PMF α) : Set α := Function.support p @[simp] theorem mem_support_iff (p : PMF α) (a : α) : a ∈ p.support ↔ p a ≠ 0 := Iff.rfl @[simp] theorem support_nonempty (p : PMF α) : p.support.Nonempty := Function.support_nonempty_iff.2 p.coe_ne_zero @[simp] theorem support_countable (p : PMF α) : p.support.Countable := Summable.countable_support_ennreal (tsum_coe_ne_top p) theorem apply_eq_zero_iff (p : PMF α) (a : α) : p a = 0 ↔ a ∉ p.support := by rw [mem_support_iff, Classical.not_not] theorem apply_pos_iff (p : PMF α) (a : α) : 0 < p a ↔ a ∈ p.support := pos_iff_ne_zero.trans (p.mem_support_iff a).symm theorem apply_eq_one_iff (p : PMF α) (a : α) : p a = 1 ↔ p.support = {a} := by refine ⟨fun h => Set.Subset.antisymm (fun a' ha' => by_contra fun ha => ?_) fun a' ha' => ha'.symm ▸ (p.mem_support_iff a).2 fun ha => zero_ne_one <\| ha.symm.trans h, fun h => _root_.trans (symm <\| tsum_eq_single a fun a' ha' => (p.apply_eq_zero_iff a').2 (h.symm ▸ ha')) p.tsum_coe⟩ suffices 1 < ∑' a, p a from ne_of_lt this p.tsum_coe.symm classical have : 0 < ∑' b, ite (b = a) 0 (p b) := lt_of_le_of_ne' zero_le' (ENNReal.summable.tsum_ne_zero_iff.2 ⟨a', ite_ne_left_iff.2 ⟨ha, Ne.symm <\| (p.mem_support_iff a').2 ha'⟩⟩) calc 1 = 1 + 0 := (add_zero 1).symm _ < p a + ∑' b, ite (b = a) 0 (p b) := (ENNReal.add_lt_add_of_le_of_lt ENNReal.one_ne_top (le_of_eq h.symm) this) _ = ite (a = a) (p a) 0 + ∑' b, ite (b = a) 0 (p b) := by rw [eq_self_iff_true, if_true] _ = (∑' b, ite (b = a) (p b) 0) + ∑' b, ite (b = a) 0 (p b) := by congr exact symm (tsum_eq_single a fun b hb => if_neg hb) _ = ∑' b, (ite (b = a) (p b) 0 + ite (b = a) 0 (p b)) := ENNReal.tsum_add.symm _ = ∑' b, p b := tsum_congr fun b => by split_ifs <;> simp only [zero_add, add_zero, le_rfl] theorem coe_le_one (p : PMF α) (a : α) : p a ≤ 1 := by classical refine hasSum_le (fun b => ?_) (hasSum_ite_eq a (p a)) (hasSum_coe_one p) split_ifs with h <;> simp only [h, zero_le', le_rfl] theorem apply_ne_top (p : PMF α) (a : α) : p a ≠ ∞ := ne_of_lt (lt_of_le_of_lt (p.coe_le_one a) ENNReal.one_lt_top) theorem apply_lt_top (p : PMF α) (a : α) : p a < ∞ := lt_of_le_of_ne le_top (p.apply_ne_top a) section OuterMeasure open MeasureTheory MeasureTheory.OuterMeasure /-- Construct an `OuterMeasure` from a `PMF`, by assigning measure to each set `s : Set α` equal to the sum of `p x` for each `x ∈ α`. -/ def toOuterMeasure (p : PMF α) : OuterMeasure α := OuterMeasure.sum fun x : α => p x • dirac x variable (p : PMF α) (s : Set α) theorem toOuterMeasure_apply : p.toOuterMeasure s = ∑' x, s.indicator p x := tsum_congr fun x => smul_dirac_apply (p x) x s @[simp] theorem toOuterMeasure_caratheodory : p.toOuterMeasure.caratheodory = ⊤ := by refine eq_top_iff.2 <\| le_trans (le_sInf fun x hx => ?_) (le_sum_caratheodory _) have ⟨y, hy⟩ := hx exact ((le_of_eq (dirac_caratheodory y).symm).trans (le_smul_caratheodory _ _)).trans (le_of_eq hy) @[simp] theorem toOuterMeasure_apply_finset (s : Finset α) : p.toOuterMeasure s = ∑ x ∈ s, p x := by refine (toOuterMeasure_apply p s).trans ((tsum_eq_sum (s := s) ?_).trans ?_) · exact fun x hx => Set.indicator_of_not_mem (Finset.mem_coe.not.2 hx) _ · exact Finset.sum_congr rfl fun x hx => Set.indicator_of_mem (Finset.mem_coe.2 hx) _ theorem toOuterMeasure_apply_singleton (a : α) : p.toOuterMeasure {a} = p a := by refine (p.toOuterMeasure_apply {a}).trans ((tsum_eq_single a fun b hb => ?_).trans ?_) · classical exact ite_eq_right_iff.2 fun hb' => False.elim <\| hb hb' · classical exact ite_eq_left_iff.2 fun ha' => False.elim <\| ha' rfl theorem toOuterMeasure_injective : (toOuterMeasure : PMF α → OuterMeasure α).Injective := fun p q h => PMF.ext fun x => (p.toOuterMeasure_apply_singleton x).symm.trans ((congr_fun (congr_arg _ h) _).trans <\| q.toOuterMeasure_apply_singleton x) @[simp] theorem toOuterMeasure_inj {p q : PMF α} : p.toOuterMeasure = q.toOuterMeasure ↔ p = q := toOuterMeasure_injective.eq_iff theorem toOuterMeasure_apply_eq_zero_iff : p.toOuterMeasure s = 0 ↔ Disjoint p.support s := by rw [toOuterMeasure_apply, ENNReal.tsum_eq_zero] exact funext_iff.symm.trans Set.indicator_eq_zero' theorem toOuterMeasure_apply_eq_one_iff : p.toOuterMeasure s = 1 ↔ p.support ⊆ s := by refine (p.toOuterMeasure_apply s).symm ▸ ⟨fun h a hap => ?_, fun h => ?_⟩ · refine by_contra fun hs => ne_of_lt ?_ (h.trans p.tsum_coe.symm) have hs' : s.indicator p a = 0 := Set.indicator_apply_eq_zero.2 fun hs' => False.elim <\| hs hs' have hsa : s.indicator p a < p a := hs'.symm ▸ (p.apply_pos_iff a).2 hap exact ENNReal.tsum_lt_tsum (p.tsum_coe_indicator_ne_top s) (fun x => Set.indicator_apply_le fun _ => le_rfl) hsa · classical suffices ∀ (x) (_ : x ∉ s), p x = 0 from _root_.trans (tsum_congr fun a => (Set.indicator_apply s p a).trans (ite_eq_left_iff.2 <\| symm ∘ this a)) p.tsum_coe exact fun a ha => (p.apply_eq_zero_iff a).2 <\| Set.not_mem_subset h ha @[simp] theorem toOuterMeasure_apply_inter_support : p.toOuterMeasure (s ∩ p.support) = p.toOuterMeasure s := by simp only [toOuterMeasure_apply, PMF.support, Set.indicator_inter_support] /-- Slightly stronger than `OuterMeasure.mono` having an intersection with `p.support`. -/ theorem toOuterMeasure_mono {s t : Set α} (h : s ∩ p.support ⊆ t) : p.toOuterMeasure s ≤ p.toOuterMeasure t := le_trans (le_of_eq (toOuterMeasure_apply_inter_support p s).symm) (p.toOuterMeasure.mono h) theorem toOuterMeasure_apply_eq_of_inter_support_eq {s t : Set α} (h : s ∩ p.support = t ∩ p.support) : p.toOuterMeasure s = p.toOuterMeasure t := le_antisymm (p.toOuterMeasure_mono (h.symm ▸ Set.inter_subset_left)) (p.toOuterMeasure_mono (h ▸ Set.inter_subset_left)) @[simp] theorem toOuterMeasure_apply_fintype [Fintype α] : p.toOuterMeasure s = ∑ x, s.indicator p x := (p.toOuterMeasure_apply s).trans (tsum_eq_sum fun x h => absurd (Finset.mem_univ x) h) end OuterMeasure section Measure open MeasureTheory /-- Since every set is Carathéodory-measurable under `PMF.toOuterMeasure`, we can further extend this `OuterMeasure` to a `Measure` on `α`. -/ def toMeasure [MeasurableSpace α] (p : PMF α) : Measure α := p.toOuterMeasure.toMeasure ((toOuterMeasure_caratheodory p).symm ▸ le_top) variable [MeasurableSpace α] (p : PMF α) (s : Set α) theorem toOuterMeasure_apply_le_toMeasure_apply : p.toOuterMeasure s ≤ p.toMeasure s := le_toMeasure_apply p.toOuterMeasure _ s theorem toMeasure_apply_eq_toOuterMeasure_apply (hs : MeasurableSet s) : p.toMeasure s = p.toOuterMeasure s := toMeasure_apply p.toOuterMeasure _ hs theorem toMeasure_apply (hs : MeasurableSet s) : p.toMeasure s = ∑' x, s.indicator p x := (p.toMeasure_apply_eq_toOuterMeasure_apply s hs).trans (p.toOuterMeasure_apply s) theorem toMeasure_apply_singleton (a : α) (h : MeasurableSet ({a} : Set α)) : p.toMeasure {a} = p a := by simp [toMeasure_apply_eq_toOuterMeasure_apply _ _ h, toOuterMeasure_apply_singleton] theorem toMeasure_apply_eq_zero_iff (hs : MeasurableSet s) : p.toMeasure s = 0 ↔ Disjoint p.support s := by rw [toMeasure_apply_eq_toOuterMeasure_apply p s hs, toOuterMeasure_apply_eq_zero_iff] theorem toMeasure_apply_eq_one_iff (hs : MeasurableSet s) : p.toMeasure s = 1 ↔ p.support ⊆ s := (p.toMeasure_apply_eq_toOuterMeasure_apply s hs).symm ▸ p.toOuterMeasure_apply_eq_one_iff s @[simp] theorem toMeasure_apply_inter_support (hs : MeasurableSet s) (hp : MeasurableSet p.support) : p.toMeasure (s ∩ p.support) = p.toMeasure s := by simp [p.toMeasure_apply_eq_toOuterMeasure_apply s hs, p.toMeasure_apply_eq_toOuterMeasure_apply _ (hs.inter hp)] @[simp] theorem restrict_toMeasure_support [MeasurableSingletonClass α] (p : PMF α) : Measure.restrict (toMeasure p) (support p) = toMeasure p := by ext s hs apply (MeasureTheory.Measure.restrict_apply hs).trans apply toMeasure_apply_inter_support p s hs p.support_countable.measurableSet theorem toMeasure_mono {s t : Set α} (hs : MeasurableSet s) (ht : MeasurableSet t) (h : s ∩ p.support ⊆ t) : p.toMeasure s ≤ p.toMeasure t := by simpa only [p.toMeasure_apply_eq_toOuterMeasure_apply, hs, ht] using toOuterMeasure_mono p h theorem toMeasure_apply_eq_of_inter_support_eq {s t : Set α} (hs : MeasurableSet s) (ht : MeasurableSet t) (h : s ∩ p.support = t ∩ p.support) : p.toMeasure s = p.toMeasure t := by simpa only [p.toMeasure_apply_eq_toOuterMeasure_apply, hs, ht] using toOuterMeasure_apply_eq_of_inter_support_eq p h section MeasurableSingletonClass variable [MeasurableSingletonClass α] theorem toMeasure_injective : (toMeasure : PMF α → Measure α).Injective := by intro p q h ext x rw [← p.toMeasure_apply_singleton x <\| measurableSet_singleton x, ← q.toMeasure_apply_singleton x <\| measurableSet_singleton x, h] @[simp] theorem toMeasure_inj {p q : PMF α} : p.toMeasure = q.toMeasure ↔ p = q := toMeasure_injective.eq_iff @[simp] theorem toMeasure_apply_finset (s : Finset α) : p.toMeasure s = ∑ x ∈ s, p x := (p.toMeasure_apply_eq_toOuterMeasure_apply s s.measurableSet).trans (p.toOuterMeasure_apply_finset s) theorem toMeasure_apply_of_finite (hs : s.Finite) : p.toMeasure s = ∑' x, s.indicator p x := (p.toMeasure_apply_eq_toOuterMeasure_apply s hs.measurableSet).trans (p.toOuterMeasure_apply s) @[simp] theorem toMeasure_apply_fintype [Fintype α] : p.toMeasure s = ∑ x, s.indicator p x := (p.toMeasure_apply_eq_toOuterMeasure_apply s s.toFinite.measurableSet).trans (p.toOuterMeasure_apply_fintype s) end MeasurableSingletonClass	end Measure end PMF	Mathlib/Probability/ProbabilityMassFunction/Basic.lean	286	290
/- Copyright (c) 2022 Joël Riou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joël Riou -/ import Mathlib.AlgebraicTopology.DoldKan.Faces import Mathlib.CategoryTheory.Idempotents.Basic /-! # Construction of projections for the Dold-Kan correspondence In this file, we construct endomorphisms `P q : K[X] ⟶ K[X]` for all `q : ℕ`. We study how they behave with respect to face maps with the lemmas `HigherFacesVanish.of_P`, `HigherFacesVanish.comp_P_eq_self` and `comp_P_eq_self_iff`. Then, we show that they are projections (see `P_f_idem` and `P_idem`). They are natural transformations (see `natTransP` and `P_f_naturality`) and are compatible with the application of additive functors (see `map_P`). By passing to the limit, these endomorphisms `P q` shall be used in `PInfty.lean` in order to define `PInfty : K[X] ⟶ K[X]`. (See `Equivalence.lean` for the general strategy of proof of the Dold-Kan equivalence.) -/ open CategoryTheory CategoryTheory.Category CategoryTheory.Limits CategoryTheory.Preadditive CategoryTheory.SimplicialObject Opposite CategoryTheory.Idempotents open Simplicial DoldKan noncomputable section namespace AlgebraicTopology namespace DoldKan variable {C : Type*} [Category C] [Preadditive C] {X : SimplicialObject C} /-- This is the inductive definition of the projections `P q : K[X] ⟶ K[X]`, with `P 0 := 𝟙 _` and `P (q+1) := P q ≫ (𝟙 _ + Hσ q)`. -/ noncomputable def P : ℕ → (K[X] ⟶ K[X]) \| 0 => 𝟙 _ \| q + 1 => P q ≫ (𝟙 _ + Hσ q) lemma P_zero : (P 0 : K[X] ⟶ K[X]) = 𝟙 _ := rfl lemma P_succ (q : ℕ) : (P (q+1) : K[X] ⟶ K[X]) = P q ≫ (𝟙 _ + Hσ q) := rfl /-- All the `P q` coincide with `𝟙 _` in degree 0. -/ @[simp] theorem P_f_0_eq (q : ℕ) : ((P q).f 0 : X _⦋0⦌ ⟶ X _⦋0⦌) = 𝟙 _ := by induction' q with q hq · rfl · simp only [P_succ, HomologicalComplex.add_f_apply, HomologicalComplex.comp_f, HomologicalComplex.id_f, id_comp, hq, Hσ_eq_zero, add_zero] /-- `Q q` is the complement projection associated to `P q` -/ def Q (q : ℕ) : K[X] ⟶ K[X] := 𝟙 _ - P q theorem P_add_Q (q : ℕ) : P q + Q q = 𝟙 K[X] := by rw [Q] abel theorem P_add_Q_f (q n : ℕ) : (P q).f n + (Q q).f n = 𝟙 (X _⦋n⦌) := HomologicalComplex.congr_hom (P_add_Q q) n @[simp] theorem Q_zero : (Q 0 : K[X] ⟶ _) = 0 := sub_self _ theorem Q_succ (q : ℕ) : (Q (q + 1) : K[X] ⟶ _) = Q q - P q ≫ Hσ q := by simp only [Q, P_succ, comp_add, comp_id] abel /-- All the `Q q` coincide with `0` in degree 0. -/ @[simp] theorem Q_f_0_eq (q : ℕ) : ((Q q).f 0 : X _⦋0⦌ ⟶ X _⦋0⦌) = 0 := by simp only [HomologicalComplex.sub_f_apply, HomologicalComplex.id_f, Q, P_f_0_eq, sub_self] namespace HigherFacesVanish /-- This lemma expresses the vanishing of `(P q).f (n+1) ≫ X.δ k : X _⦋n+1⦌ ⟶ X _⦋n⦌` when `k≠0` and `k≥n-q+2` -/ theorem of_P : ∀ q n : ℕ, HigherFacesVanish q ((P q).f (n + 1) : X _⦋n + 1⦌ ⟶ X _⦋n + 1⦌) \| 0 => fun n j hj₁ => by omega \| q + 1 => fun n => by simp only [P_succ] exact (of_P q n).induction @[reassoc] theorem comp_P_eq_self {Y : C} {n q : ℕ} {φ : Y ⟶ X _⦋n + 1⦌} (v : HigherFacesVanish q φ) : φ ≫ (P q).f (n + 1) = φ := by induction' q with q hq · simp only [P_zero] apply comp_id · simp only [P_succ, comp_add, HomologicalComplex.comp_f, HomologicalComplex.add_f_apply, comp_id, ← assoc, hq v.of_succ, add_eq_left] by_cases hqn : n < q · exact v.of_succ.comp_Hσ_eq_zero hqn · obtain ⟨a, ha⟩ := Nat.le.dest (not_lt.mp hqn) have hnaq : n = a + q := by omega simp only [v.of_succ.comp_Hσ_eq hnaq, neg_eq_zero, ← assoc] have eq := v ⟨a, by omega⟩ (by simp only [hnaq, Nat.succ_eq_add_one, add_assoc] rfl) simp only [Fin.succ_mk] at eq simp only [eq, zero_comp] end HigherFacesVanish theorem comp_P_eq_self_iff {Y : C} {n q : ℕ} {φ : Y ⟶ X _⦋n + 1⦌} : φ ≫ (P q).f (n + 1) = φ ↔ HigherFacesVanish q φ := by constructor · intro hφ rw [← hφ] apply HigherFacesVanish.of_comp apply HigherFacesVanish.of_P · exact HigherFacesVanish.comp_P_eq_self @[reassoc (attr := simp)] theorem P_f_idem (q n : ℕ) : ((P q).f n : X _⦋n⦌ ⟶ _) ≫ (P q).f n = (P q).f n := by rcases n with (_\|n) · rw [P_f_0_eq q, comp_id] · exact (HigherFacesVanish.of_P q n).comp_P_eq_self @[reassoc (attr := simp)] theorem Q_f_idem (q n : ℕ) : ((Q q).f n : X _⦋n⦌ ⟶ _) ≫ (Q q).f n = (Q q).f n := idem_of_id_sub_idem _ (P_f_idem q n) @[reassoc (attr := simp)] theorem P_idem (q : ℕ) : (P q : K[X] ⟶ K[X]) ≫ P q = P q := by ext n exact P_f_idem q n @[reassoc (attr := simp)] theorem Q_idem (q : ℕ) : (Q q : K[X] ⟶ K[X]) ≫ Q q = Q q := by ext n exact Q_f_idem q n /-- For each `q`, `P q` is a natural transformation. -/ @[simps] def natTransP (q : ℕ) : alternatingFaceMapComplex C ⟶ alternatingFaceMapComplex C where app _ := P q naturality _ _ f := by induction' q with q hq · dsimp [alternatingFaceMapComplex] simp only [P_zero, id_comp, comp_id] · simp only [P_succ, add_comp, comp_add, assoc, comp_id, hq, reassoc_of% hq] -- `erw` is needed to see through `natTransHσ q).app = Hσ q` erw [(natTransHσ q).naturality f] rfl @[reassoc (attr := simp)] theorem P_f_naturality (q n : ℕ) {X Y : SimplicialObject C} (f : X ⟶ Y) : f.app (op ⦋n⦌) ≫ (P q).f n = (P q).f n ≫ f.app (op ⦋n⦌) := HomologicalComplex.congr_hom ((natTransP q).naturality f) n @[reassoc (attr := simp)] theorem Q_f_naturality (q n : ℕ) {X Y : SimplicialObject C} (f : X ⟶ Y) : f.app (op ⦋n⦌) ≫ (Q q).f n = (Q q).f n ≫ f.app (op ⦋n⦌) := by simp only [Q, HomologicalComplex.sub_f_apply, HomologicalComplex.id_f, comp_sub, P_f_naturality, sub_comp, sub_left_inj] dsimp simp only [comp_id, id_comp] /-- For each `q`, `Q q` is a natural transformation. -/ @[simps]	def natTransQ (q : ℕ) : alternatingFaceMapComplex C ⟶ alternatingFaceMapComplex C where app _ := Q q	Mathlib/AlgebraicTopology/DoldKan/Projections.lean	173	175
/- 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 -/ import Mathlib.MeasureTheory.Group.Arithmetic import Mathlib.Topology.GDelta.UniformSpace import Mathlib.Topology.Instances.EReal.Lemmas import Mathlib.Topology.Instances.Rat /-! # Borel (measurable) space ## Main definitions * `borel α` : the least `σ`-algebra that contains all open sets; * `class BorelSpace` : a space with `TopologicalSpace` and `MeasurableSpace` structures such that `‹MeasurableSpace α› = borel α`; * `class OpensMeasurableSpace` : a space with `TopologicalSpace` and `MeasurableSpace` structures such that all open sets are measurable; equivalently, `borel α ≤ ‹MeasurableSpace α›`. * `BorelSpace` instances on `Empty`, `Unit`, `Bool`, `Nat`, `Int`, `Rat`; * `MeasurableSpace` and `BorelSpace` instances on `ℝ`, `ℝ≥0`, `ℝ≥0∞`. ## Main statements * `IsOpen.measurableSet`, `IsClosed.measurableSet`: open and closed sets are measurable; * `Continuous.measurable` : a continuous function is measurable; * `Continuous.measurable2` : if `f : α → β` and `g : α → γ` are measurable and `op : β × γ → δ` is continuous, then `fun x => op (f x, g y)` is measurable; * `Measurable.add` etc : dot notation for arithmetic operations on `Measurable` predicates, and similarly for `dist` and `edist`; * `AEMeasurable.add` : similar dot notation for almost everywhere measurable functions; -/ noncomputable section open Filter MeasureTheory Set Topology open scoped NNReal ENNReal MeasureTheory universe u v w x y variable {α β γ γ₂ δ : Type} {ι : Sort y} {s t u : Set α} open MeasurableSpace TopologicalSpace /-- `MeasurableSpace` structure generated by `TopologicalSpace`. -/ def borel (α : Type u) [TopologicalSpace α] : MeasurableSpace α := generateFrom { s : Set α \| IsOpen s } theorem borel_anti : Antitone (@borel α) := fun _ _ h => MeasurableSpace.generateFrom_le fun _ hs => .basic _ (h _ hs) theorem borel_eq_top_of_discrete [TopologicalSpace α] [DiscreteTopology α] : borel α = ⊤ := top_le_iff.1 fun s _ => GenerateMeasurable.basic s (isOpen_discrete s) theorem borel_eq_generateFrom_of_subbasis {s : Set (Set α)} [t : TopologicalSpace α] [SecondCountableTopology α] (hs : t = .generateFrom s) : borel α = .generateFrom s := le_antisymm (generateFrom_le fun u (hu : t.IsOpen u) => by rw [hs] at hu induction hu with \| basic u hu => exact GenerateMeasurable.basic u hu \| univ => exact @MeasurableSet.univ α (generateFrom s) \| inter s₁ s₂ _ _ hs₁ hs₂ => exact @MeasurableSet.inter α (generateFrom s) _ _ hs₁ hs₂ \| sUnion f hf ih => rcases isOpen_sUnion_countable f (by rwa [hs]) with ⟨v, hv, vf, vu⟩ rw [← vu] exact @MeasurableSet.sUnion α (generateFrom s) _ hv fun x xv => ih _ (vf xv)) (generateFrom_le fun u hu => GenerateMeasurable.basic _ <\| show t.IsOpen u by rw [hs]; exact GenerateOpen.basic _ hu) theorem TopologicalSpace.IsTopologicalBasis.borel_eq_generateFrom [TopologicalSpace α] [SecondCountableTopology α] {s : Set (Set α)} (hs : IsTopologicalBasis s) : borel α = .generateFrom s := borel_eq_generateFrom_of_subbasis hs.eq_generateFrom theorem isPiSystem_isOpen [TopologicalSpace α] : IsPiSystem ({s : Set α \| IsOpen s}) := fun _s hs _t ht _ => IsOpen.inter hs ht lemma isPiSystem_isClosed [TopologicalSpace α] : IsPiSystem ({s : Set α \| IsClosed s}) := fun _s hs _t ht _ ↦ IsClosed.inter hs ht theorem borel_eq_generateFrom_isClosed [TopologicalSpace α] : borel α = .generateFrom { s \| IsClosed s } := le_antisymm (generateFrom_le fun _t ht => @MeasurableSet.of_compl α _ (generateFrom { s \| IsClosed s }) (GenerateMeasurable.basic _ <\| isClosed_compl_iff.2 ht)) (generateFrom_le fun _t ht => @MeasurableSet.of_compl α _ (borel α) (GenerateMeasurable.basic _ <\| isOpen_compl_iff.2 ht)) theorem borel_comap {f : α → β} {t : TopologicalSpace β} : @borel α (t.induced f) = (@borel β t).comap f := comap_generateFrom.symm theorem Continuous.borel_measurable [TopologicalSpace α] [TopologicalSpace β] {f : α → β} (hf : Continuous f) : @Measurable α β (borel α) (borel β) f := Measurable.of_le_map <\| generateFrom_le fun s hs => GenerateMeasurable.basic (f ⁻¹' s) (hs.preimage hf) /-- A space with `MeasurableSpace` and `TopologicalSpace` structures such that all open sets are measurable. -/ class OpensMeasurableSpace (α : Type) [TopologicalSpace α] [h : MeasurableSpace α] : Prop where /-- Borel-measurable sets are measurable. -/ borel_le : borel α ≤ h /-- A space with `MeasurableSpace` and `TopologicalSpace` structures such that the `σ`-algebra of measurable sets is exactly the `σ`-algebra generated by open sets. -/ class BorelSpace (α : Type) [TopologicalSpace α] [MeasurableSpace α] : Prop where /-- The measurable sets are exactly the Borel-measurable sets. -/ measurable_eq : ‹MeasurableSpace α› = borel α namespace Mathlib.Tactic.Borelize open Lean Elab Term Tactic Meta /-- The behaviour of `borelize α` depends on the existing assumptions on `α`. - if `α` is a topological space with instances `[MeasurableSpace α] [BorelSpace α]`, then `borelize α` replaces the former instance by `borel α`; - otherwise, `borelize α` adds instances `borel α : MeasurableSpace α` and `⟨rfl⟩ : BorelSpace α`. Finally, `borelize α β γ` runs `borelize α; borelize β; borelize γ`. -/ syntax "borelize" (ppSpace colGt term:max) : tactic /-- Add instances `borel e : MeasurableSpace e` and `⟨rfl⟩ : BorelSpace e`. -/ def addBorelInstance (e : Expr) : TacticM Unit := do let t ← Lean.Elab.Term.exprToSyntax e evalTactic <\| ← `(tactic\| refine_lift letI : MeasurableSpace $t := borel $t haveI : BorelSpace $t := ⟨rfl⟩ ?_) /-- Given a type `e`, an assumption `i : MeasurableSpace e`, and an instance `[BorelSpace e]`, replace `i` with `borel e`. -/ def borelToRefl (e : Expr) (i : FVarId) : TacticM Unit := do let te ← Lean.Elab.Term.exprToSyntax e evalTactic <\| ← `(tactic\| have := @BorelSpace.measurable_eq $te _ _ _) try liftMetaTactic fun m => return [← subst m i] catch _ => let et ← synthInstance (← mkAppOptM ``TopologicalSpace #[e]) throwError m!"\ `‹TopologicalSpace {e}› := {et}\n\ depends on\n\ {Expr.fvar i} : MeasurableSpace {e}`\n\ so `borelize` isn't available" evalTactic <\| ← `(tactic\| refine_lift letI : MeasurableSpace $te := borel $te ?_) /-- Given a type `$t`, if there is an assumption `[i : MeasurableSpace $t]`, then try to prove `[BorelSpace $t]` and replace `i` with `borel $t`. Otherwise, add instances `borel $t : MeasurableSpace $t` and `⟨rfl⟩ : BorelSpace $t`. -/ def borelize (t : Term) : TacticM Unit := withMainContext <\| do let u ← mkFreshLevelMVar let e ← withoutRecover <\| Tactic.elabTermEnsuringType t (mkSort (mkLevelSucc u)) let i? ← findLocalDeclWithType? (← mkAppOptM ``MeasurableSpace #[e]) i?.elim (addBorelInstance e) (borelToRefl e) elab_rules : tactic \| `(tactic\| borelize $[$t:term]) => t.forM borelize end Mathlib.Tactic.Borelize instance (priority := 100) OrderDual.opensMeasurableSpace {α : Type} [TopologicalSpace α] [MeasurableSpace α] [h : OpensMeasurableSpace α] : OpensMeasurableSpace αᵒᵈ where borel_le := h.borel_le instance (priority := 100) OrderDual.borelSpace {α : Type} [TopologicalSpace α] [MeasurableSpace α] [h : BorelSpace α] : BorelSpace αᵒᵈ where measurable_eq := h.measurable_eq /-- In a `BorelSpace` all open sets are measurable. -/ instance (priority := 100) BorelSpace.opensMeasurable {α : Type} [TopologicalSpace α] [MeasurableSpace α] [BorelSpace α] : OpensMeasurableSpace α := ⟨ge_of_eq <\| BorelSpace.measurable_eq⟩ instance Subtype.borelSpace {α : Type} [TopologicalSpace α] [MeasurableSpace α] [hα : BorelSpace α] (s : Set α) : BorelSpace s := ⟨by borelize α; symm; apply borel_comap⟩ instance Countable.instBorelSpace [Countable α] [MeasurableSpace α] [MeasurableSingletonClass α] [TopologicalSpace α] [DiscreteTopology α] : BorelSpace α := by have : ∀ s, @MeasurableSet α inferInstance s := fun s ↦ s.to_countable.measurableSet have : ∀ s, @MeasurableSet α (borel α) s := fun s ↦ measurableSet_generateFrom (isOpen_discrete s) exact ⟨by aesop⟩ instance Subtype.opensMeasurableSpace {α : Type} [TopologicalSpace α] [MeasurableSpace α] [h : OpensMeasurableSpace α] (s : Set α) : OpensMeasurableSpace s := ⟨by rw [borel_comap] exact comap_mono h.1⟩ lemma opensMeasurableSpace_iff_forall_measurableSet [TopologicalSpace α] [MeasurableSpace α] : OpensMeasurableSpace α ↔ (∀ (s : Set α), IsOpen s → MeasurableSet s) := by refine ⟨fun h s hs ↦ ?_, fun h ↦ ⟨generateFrom_le h⟩⟩ exact OpensMeasurableSpace.borel_le _ <\| GenerateMeasurable.basic _ hs instance (priority := 100) BorelSpace.countablyGenerated {α : Type*} [TopologicalSpace α] [MeasurableSpace α] [BorelSpace α] [SecondCountableTopology α] : CountablyGenerated α := by obtain ⟨b, bct, -, hb⟩ := exists_countable_basis α refine ⟨⟨b, bct, ?_⟩⟩ borelize α exact hb.borel_eq_generateFrom section variable [TopologicalSpace α] [MeasurableSpace α] [OpensMeasurableSpace α] [TopologicalSpace β] [MeasurableSpace β] [OpensMeasurableSpace β] [TopologicalSpace γ] [MeasurableSpace γ] [BorelSpace γ] [TopologicalSpace γ₂] [MeasurableSpace γ₂] [BorelSpace γ₂] [MeasurableSpace δ] theorem IsOpen.measurableSet (h : IsOpen s) : MeasurableSet s := OpensMeasurableSpace.borel_le _ <\| GenerateMeasurable.basic _ h theorem IsOpen.nullMeasurableSet {μ} (h : IsOpen s) : NullMeasurableSet s μ := h.measurableSet.nullMeasurableSet open scoped Function in -- required for scoped `on` notation @[elab_as_elim] theorem MeasurableSet.induction_on_open {C : ∀ s : Set γ, MeasurableSet s → Prop} (isOpen : ∀ U (hU : IsOpen U), C U hU.measurableSet) (compl : ∀ t (ht : MeasurableSet t), C t ht → C tᶜ ht.compl) (iUnion : ∀ f : ℕ → Set γ, Pairwise (Disjoint on f) → ∀ (hf : ∀ i, MeasurableSet (f i)), (∀ i, C (f i) (hf i)) → C (⋃ i, f i) (.iUnion hf)) : ∀ t (ht : MeasurableSet t), C t ht := fun t ht ↦ MeasurableSpace.induction_on_inter BorelSpace.measurable_eq isPiSystem_isOpen (isOpen _ isOpen_empty) isOpen compl iUnion t ht instance (priority := 1000) {s : Set α} [h : HasCountableSeparatingOn α IsOpen s] : CountablySeparated s := by rw [CountablySeparated.subtype_iff] exact .mono (fun _ ↦ IsOpen.measurableSet) Subset.rfl @[measurability] theorem measurableSet_interior : MeasurableSet (interior s) := isOpen_interior.measurableSet theorem IsGδ.measurableSet (h : IsGδ s) : MeasurableSet s := by rcases h with ⟨S, hSo, hSc, rfl⟩ exact MeasurableSet.sInter hSc fun t ht => (hSo t ht).measurableSet theorem measurableSet_of_continuousAt {β} [PseudoEMetricSpace β] (f : α → β) : MeasurableSet { x \| ContinuousAt f x } := (IsGδ.setOf_continuousAt f).measurableSet theorem IsClosed.measurableSet (h : IsClosed s) : MeasurableSet s := h.isOpen_compl.measurableSet.of_compl theorem IsClosed.nullMeasurableSet {μ} (h : IsClosed s) : NullMeasurableSet s μ := h.measurableSet.nullMeasurableSet theorem IsCompact.measurableSet [T2Space α] (h : IsCompact s) : MeasurableSet s := h.isClosed.measurableSet theorem IsCompact.nullMeasurableSet [T2Space α] {μ} (h : IsCompact s) : NullMeasurableSet s μ := h.isClosed.nullMeasurableSet /-- If two points are topologically inseparable, then they can't be separated by a Borel measurable set. -/ theorem Inseparable.mem_measurableSet_iff {x y : γ} (h : Inseparable x y) {s : Set γ} (hs : MeasurableSet s) : x ∈ s ↔ y ∈ s := MeasurableSet.induction_on_open (fun _ ↦ h.mem_open_iff) (fun _ _ ↦ Iff.not) (fun _ _ _ h ↦ by simp [h]) s hs /-- If `K` is a compact set in an R₁ space and `s ⊇ K` is a Borel measurable superset, then `s` includes the closure of `K` as well. -/ theorem IsCompact.closure_subset_measurableSet [R1Space γ] {K s : Set γ} (hK : IsCompact K) (hs : MeasurableSet s) (hKs : K ⊆ s) : closure K ⊆ s := by rw [hK.closure_eq_biUnion_inseparable, iUnion₂_subset_iff] exact fun x hx y hy ↦ (hy.mem_measurableSet_iff hs).1 (hKs hx) /-- In an R₁ topological space with Borel measure `μ`, the measure of the closure of a compact set `K` is equal to the measure of `K`. See also `MeasureTheory.Measure.OuterRegular.measure_closure_eq_of_isCompact` for a version that assumes `μ` to be outer regular but does not assume the `σ`-algebra to be Borel. -/ theorem IsCompact.measure_closure [R1Space γ] {K : Set γ} (hK : IsCompact K) (μ : Measure γ) : μ (closure K) = μ K := by refine le_antisymm ?_ (measure_mono subset_closure) calc μ (closure K) ≤ μ (toMeasurable μ K) := measure_mono <\| hK.closure_subset_measurableSet (measurableSet_toMeasurable ..) (subset_toMeasurable ..) _ = μ K := measure_toMeasurable .. @[measurability] theorem measurableSet_closure : MeasurableSet (closure s) := isClosed_closure.measurableSet theorem measurable_of_isOpen {f : δ → γ} (hf : ∀ s, IsOpen s → MeasurableSet (f ⁻¹' s)) : Measurable f := by rw [‹BorelSpace γ›.measurable_eq] exact measurable_generateFrom hf theorem measurable_of_isClosed {f : δ → γ} (hf : ∀ s, IsClosed s → MeasurableSet (f ⁻¹' s)) : Measurable f := by apply measurable_of_isOpen; intro s hs rw [← MeasurableSet.compl_iff, ← preimage_compl]; apply hf; rw [isClosed_compl_iff]; exact hs theorem measurable_of_isClosed' {f : δ → γ} (hf : ∀ s, IsClosed s → s.Nonempty → s ≠ univ → MeasurableSet (f ⁻¹' s)) : Measurable f := by apply measurable_of_isClosed; intro s hs rcases eq_empty_or_nonempty s with h1 \| h1 · simp [h1] by_cases h2 : s = univ · simp [h2] exact hf s hs h1 h2 instance nhds_isMeasurablyGenerated (a : α) : (𝓝 a).IsMeasurablyGenerated := by rw [nhds, iInf_subtype'] refine @Filter.iInf_isMeasurablyGenerated α _ _ _ fun i => ?_ exact i.2.2.measurableSet.principal_isMeasurablyGenerated /-- If `s` is a measurable set, then `𝓝[s] a` is a measurably generated filter for each `a`. This cannot be an `instance` because it depends on a non-instance `hs : MeasurableSet s`. -/ theorem MeasurableSet.nhdsWithin_isMeasurablyGenerated {s : Set α} (hs : MeasurableSet s) (a : α) : (𝓝[s] a).IsMeasurablyGenerated := haveI := hs.principal_isMeasurablyGenerated Filter.inf_isMeasurablyGenerated _ _ instance (priority := 100) OpensMeasurableSpace.separatesPoints [T0Space α] : SeparatesPoints α := by rw [separatesPoints_iff] intro x y hxy	apply Inseparable.eq rw [inseparable_iff_forall_isOpen] exact fun s hs => hxy _ hs.measurableSet	Mathlib/MeasureTheory/Constructions/BorelSpace/Basic.lean	333	336
/- Copyright (c) 2019 Riccardo Brasca. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Riccardo Brasca, Paul Lezeau, Junyan Xu -/ import Mathlib.RingTheory.AdjoinRoot import Mathlib.FieldTheory.Minpoly.Field import Mathlib.RingTheory.Polynomial.GaussLemma /-! # Minimal polynomials over a GCD monoid This file specializes the theory of minpoly to the case of an algebra over a GCD monoid. ## Main results * `minpoly.isIntegrallyClosed_eq_field_fractions`: For integrally closed domains, the minimal polynomial over the ring is the same as the minimal polynomial over the fraction field. * `minpoly.isIntegrallyClosed_dvd` : For integrally closed domains, the minimal polynomial divides any primitive polynomial that has the integral element as root. * `IsIntegrallyClosed.Minpoly.unique` : The minimal polynomial of an element `x` is uniquely characterized by its defining property: if there is another monic polynomial of minimal degree that has `x` as a root, then this polynomial is equal to the minimal polynomial of `x`. -/ open Polynomial Set Function minpoly namespace minpoly variable {R S : Type} [CommRing R] [CommRing S] [IsDomain R] [Algebra R S] section variable (K L : Type) [Field K] [Algebra R K] [IsFractionRing R K] [CommRing L] [Nontrivial L] [Algebra R L] [Algebra S L] [Algebra K L] [IsScalarTower R K L] [IsScalarTower R S L] variable [IsIntegrallyClosed R] /-- For integrally closed domains, the minimal polynomial over the ring is the same as the minimal polynomial over the fraction field. See `minpoly.isIntegrallyClosed_eq_field_fractions'` if `S` is already a `K`-algebra. -/ theorem isIntegrallyClosed_eq_field_fractions [IsDomain S] {s : S} (hs : IsIntegral R s) : minpoly K (algebraMap S L s) = (minpoly R s).map (algebraMap R K) := by refine (eq_of_irreducible_of_monic ?_ ?_ ?_).symm · exact ((monic hs).irreducible_iff_irreducible_map_fraction_map).1 (irreducible hs) · rw [aeval_map_algebraMap, aeval_algebraMap_apply, aeval, map_zero] · exact (monic hs).map _ /-- For integrally closed domains, the minimal polynomial over the ring is the same as the minimal polynomial over the fraction field. Compared to `minpoly.isIntegrallyClosed_eq_field_fractions`, this version is useful if the element is in a ring that is already a `K`-algebra. -/ theorem isIntegrallyClosed_eq_field_fractions' [IsDomain S] [Algebra K S] [IsScalarTower R K S] {s : S} (hs : IsIntegral R s) : minpoly K s = (minpoly R s).map (algebraMap R K) := by let L := FractionRing S rw [← isIntegrallyClosed_eq_field_fractions K L hs, algebraMap_eq (IsFractionRing.injective S L)] end variable [IsDomain S] [NoZeroSMulDivisors R S] variable [IsIntegrallyClosed R] /-- For integrally closed rings, the minimal polynomial divides any polynomial that has the integral element as root. See also `minpoly.dvd` which relaxes the assumptions on `S` in exchange for stronger assumptions on `R`. -/ theorem isIntegrallyClosed_dvd {s : S} (hs : IsIntegral R s) {p : R[X]} (hp : Polynomial.aeval s p = 0) : minpoly R s ∣ p := by let K := FractionRing R let L := FractionRing S let _ : Algebra K L := FractionRing.liftAlgebra R L have := FractionRing.isScalarTower_liftAlgebra R L have : minpoly K (algebraMap S L s) ∣ map (algebraMap R K) (p %ₘ minpoly R s) := by rw [map_modByMonic _ (minpoly.monic hs), modByMonic_eq_sub_mul_div] · refine dvd_sub (minpoly.dvd K (algebraMap S L s) ?_) ?_ · rw [← map_aeval_eq_aeval_map, hp, map_zero] rw [← IsScalarTower.algebraMap_eq, ← IsScalarTower.algebraMap_eq] apply dvd_mul_of_dvd_left rw [isIntegrallyClosed_eq_field_fractions K L hs] exact Monic.map _ (minpoly.monic hs) rw [isIntegrallyClosed_eq_field_fractions _ _ hs, map_dvd_map (algebraMap R K) (IsFractionRing.injective R K) (minpoly.monic hs)] at this rw [← modByMonic_eq_zero_iff_dvd (minpoly.monic hs)] exact Polynomial.eq_zero_of_dvd_of_degree_lt this (degree_modByMonic_lt p <\| minpoly.monic hs) theorem isIntegrallyClosed_dvd_iff {s : S} (hs : IsIntegral R s) (p : R[X]) : Polynomial.aeval s p = 0 ↔ minpoly R s ∣ p := ⟨fun hp => isIntegrallyClosed_dvd hs hp, fun hp => by simpa only [RingHom.mem_ker, RingHom.coe_comp, coe_evalRingHom, coe_mapRingHom, Function.comp_apply, eval_map, ← aeval_def] using aeval_eq_zero_of_dvd_aeval_eq_zero hp (minpoly.aeval R s)⟩ theorem ker_eval {s : S} (hs : IsIntegral R s) : RingHom.ker ((Polynomial.aeval s).toRingHom : R[X] →+* S) = Ideal.span ({minpoly R s} : Set R[X]) := by ext p simp_rw [RingHom.mem_ker, AlgHom.toRingHom_eq_coe, AlgHom.coe_toRingHom, isIntegrallyClosed_dvd_iff hs, ← Ideal.mem_span_singleton] /-- If an element `x` is a root of a nonzero polynomial `p`, then the degree of `p` is at least the degree of the minimal polynomial of `x`. See also `minpoly.degree_le_of_ne_zero` which relaxes the assumptions on `S` in exchange for stronger assumptions on `R`. -/ theorem IsIntegrallyClosed.degree_le_of_ne_zero {s : S} (hs : IsIntegral R s) {p : R[X]} (hp0 : p ≠ 0) (hp : Polynomial.aeval s p = 0) : degree (minpoly R s) ≤ degree p := by rw [degree_eq_natDegree (minpoly.ne_zero hs), degree_eq_natDegree hp0] norm_cast exact natDegree_le_of_dvd ((isIntegrallyClosed_dvd_iff hs _).mp hp) hp0 /-- The minimal polynomial of an element `x` is uniquely characterized by its defining property: if there is another monic polynomial of minimal degree that has `x` as a root, then this polynomial is equal to the minimal polynomial of `x`. See also `minpoly.unique` which relaxes the assumptions on `S` in exchange for stronger assumptions on `R`. -/	theorem _root_.IsIntegrallyClosed.minpoly.unique {s : S} {P : R[X]} (hmo : P.Monic) (hP : Polynomial.aeval s P = 0) (Pmin : ∀ Q : R[X], Q.Monic → Polynomial.aeval s Q = 0 → degree P ≤ degree Q) : P = minpoly R s := by have hs : IsIntegral R s := ⟨P, hmo, hP⟩	Mathlib/FieldTheory/Minpoly/IsIntegrallyClosed.lean	114	118
/- 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 Here we state some lemmas that 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 how the termination of one sequence implies the termination of another sequence. -/ variable {n : ℕ} theorem IntFractPair.get?_seq1_eq_succ_get?_stream : (IntFractPair.seq1 v).snd.get? n = (IntFractPair.stream v) (n + 1) := rfl section Termination /-! #### Translation of the Termination of the Sequences Let's first show how the termination of one sequence implies the termination of another sequence. -/ theorem of_terminatedAt_iff_intFractPair_seq1_terminatedAt : (of v).TerminatedAt n ↔ (IntFractPair.seq1 v).snd.TerminatedAt n := Option.map_eq_none_iff theorem of_terminatedAt_n_iff_succ_nth_intFractPair_stream_eq_none : (of v).TerminatedAt n ↔ IntFractPair.stream v (n + 1) = none := by rw [of_terminatedAt_iff_intFractPair_seq1_terminatedAt, Stream'.Seq.TerminatedAt, IntFractPair.get?_seq1_eq_succ_get?_stream] end Termination section Values /-! #### Translation of the Values of the Sequence Now let's show how the values of the sequences correspond to one another. -/ theorem IntFractPair.exists_succ_get?_stream_of_gcf_of_get?_eq_some {gp_n : Pair K} (s_nth_eq : (of v).s.get? n = some gp_n) : ∃ ifp : IntFractPair K, IntFractPair.stream v (n + 1) = some ifp ∧ (ifp.b : K) = gp_n.b := by obtain ⟨ifp, stream_succ_nth_eq, gp_n_eq⟩ : ∃ ifp, IntFractPair.stream v (n + 1) = some ifp ∧ Pair.mk 1 (ifp.b : K) = gp_n := by unfold of IntFractPair.seq1 at s_nth_eq simpa [Stream'.Seq.get?_tail, Stream'.Seq.map_get?] using s_nth_eq cases gp_n_eq simp_all only [Option.some.injEq, exists_eq_left'] /-- Shows how the entries of the sequence of the computed continued fraction can be obtained by the integer parts of the stream of integer and fractional parts. -/ theorem get?_of_eq_some_of_succ_get?_intFractPair_stream {ifp_succ_n : IntFractPair K} (stream_succ_nth_eq : IntFractPair.stream v (n + 1) = some ifp_succ_n) : (of v).s.get? n = some ⟨1, ifp_succ_n.b⟩ := by unfold of IntFractPair.seq1 simp [Stream'.Seq.map_tail, Stream'.Seq.get?_tail, Stream'.Seq.map_get?, stream_succ_nth_eq] /-- Shows how the entries of the sequence of the computed continued fraction can be obtained by the fractional parts of the stream of integer and fractional parts. -/ theorem get?_of_eq_some_of_get?_intFractPair_stream_fr_ne_zero {ifp_n : IntFractPair K} (stream_nth_eq : IntFractPair.stream v n = some ifp_n) (nth_fr_ne_zero : ifp_n.fr ≠ 0) : (of v).s.get? n = some ⟨1, (IntFractPair.of ifp_n.fr⁻¹).b⟩ := have : IntFractPair.stream v (n + 1) = some (IntFractPair.of ifp_n.fr⁻¹) := by cases ifp_n simp only [IntFractPair.stream, Nat.add_eq, add_zero, stream_nth_eq, Option.some_bind, ite_eq_right_iff] intro; contradiction get?_of_eq_some_of_succ_get?_intFractPair_stream this open Int IntFractPair theorem of_s_head_aux (v : K) : (of v).s.get? 0 = (IntFractPair.stream v 1).bind (some ∘ fun p =>	{ a := 1 b := p.b }) := by rw [of, IntFractPair.seq1] simp only [of, Stream'.Seq.map_tail, Stream'.Seq.map, Stream'.Seq.tail, Stream'.Seq.head, Stream'.Seq.get?, Stream'.map] rw [← Stream'.get_succ, Stream'.get, Option.map.eq_def] split <;> simp_all only [Option.some_bind, Option.none_bind, Function.comp_apply] /-- This gives the first pair of coefficients of the continued fraction of a non-integer `v`.	Mathlib/Algebra/ContinuedFractions/Computation/Translations.lean	250	258
/- Copyright (c) 2023 Dagur Asgeirsson. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Dagur Asgeirsson -/ import Mathlib.Topology.Category.Profinite.Nobeling.Basic import Mathlib.Topology.Category.Profinite.Nobeling.Induction import Mathlib.Topology.Category.Profinite.Nobeling.Span import Mathlib.Topology.Category.Profinite.Nobeling.Successor import Mathlib.Topology.Category.Profinite.Nobeling.ZeroLimit deprecated_module (since := "2025-04-13")		Mathlib/Topology/Category/Profinite/Nobeling.lean	1,670	1,681
/- Copyright (c) 2020 Bhavik Mehta. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Bhavik Mehta, Kim Morrison -/ import Mathlib.CategoryTheory.Subobject.MonoOver import Mathlib.CategoryTheory.Skeletal import Mathlib.CategoryTheory.ConcreteCategory.Basic import Mathlib.CategoryTheory.Limits.Shapes.Pullback.CommSq import Mathlib.Tactic.ApplyFun import Mathlib.Tactic.CategoryTheory.Elementwise /-! # Subobjects We define `Subobject X` as the quotient (by isomorphisms) of `MonoOver X := {f : Over X // Mono f.hom}`. Here `MonoOver X` is a thin category (a pair of objects has at most one morphism between them), so we can think of it as a preorder. However as it is not skeletal, it is not a partial order. There is a coercion from `Subobject X` back to the ambient category `C` (using choice to pick a representative), and for `P : Subobject X`, `P.arrow : (P : C) ⟶ X` is the inclusion morphism. We provide * `def pullback [HasPullbacks C] (f : X ⟶ Y) : Subobject Y ⥤ Subobject X` * `def map (f : X ⟶ Y) [Mono f] : Subobject X ⥤ Subobject Y` * `def «exists_» [HasImages C] (f : X ⟶ Y) : Subobject X ⥤ Subobject Y` and prove their basic properties and relationships. These are all easy consequences of the earlier development of the corresponding functors for `MonoOver`. The subobjects of `X` form a preorder making them into a category. We have `X ≤ Y` if and only if `X.arrow` factors through `Y.arrow`: see `ofLE`/`ofLEMk`/`ofMkLE`/`ofMkLEMk` and `le_of_comm`. Similarly, to show that two subobjects are equal, we can supply an isomorphism between the underlying objects that commutes with the arrows (`eq_of_comm`). See also * `CategoryTheory.Subobject.factorThru` : an API describing factorization of morphisms through subobjects. * `CategoryTheory.Subobject.lattice` : the lattice structures on subobjects. ## Notes This development originally appeared in Bhavik Mehta's "Topos theory for Lean" repository, and was ported to mathlib by Kim Morrison. ### Implementation note Currently we describe `pullback`, `map`, etc., as functors. It may be better to just say that they are monotone functions, and even avoid using categorical language entirely when describing `Subobject X`. (It's worth keeping this in mind in future use; it should be a relatively easy change here if it looks preferable.) ### Relation to pseudoelements There is a separate development of pseudoelements in `CategoryTheory.Abelian.Pseudoelements`, as a quotient (but not by isomorphism) of `Over X`. When a morphism `f` has an image, the image represents the same pseudoelement. In a category with images `Pseudoelements X` could be constructed as a quotient of `MonoOver X`. In fact, in an abelian category (I'm not sure in what generality beyond that), `Pseudoelements X` agrees with `Subobject X`, but we haven't developed this in mathlib yet. -/ universe v₁ v₂ u₁ u₂ noncomputable section namespace CategoryTheory open CategoryTheory CategoryTheory.Category CategoryTheory.Limits variable {C : Type u₁} [Category.{v₁} C] {X Y Z : C} variable {D : Type u₂} [Category.{v₂} D] /-! We now construct the subobject lattice for `X : C`, as the quotient by isomorphisms of `MonoOver X`. Since `MonoOver X` is a thin category, we use `ThinSkeleton` to take the quotient. Essentially all the structure defined above on `MonoOver X` descends to `Subobject X`, with morphisms becoming inequalities, and isomorphisms becoming equations. -/ /-- The category of subobjects of `X : C`, defined as isomorphism classes of monomorphisms into `X`. -/ def Subobject (X : C) := ThinSkeleton (MonoOver X) instance (X : C) : PartialOrder (Subobject X) := inferInstanceAs <\| PartialOrder (ThinSkeleton (MonoOver X)) namespace Subobject -- Porting note: made it a def rather than an abbreviation -- because Lean would make it too transparent /-- Convenience constructor for a subobject. -/ def mk {X A : C} (f : A ⟶ X) [Mono f] : Subobject X := (toThinSkeleton _).obj (MonoOver.mk' f) section attribute [local ext] CategoryTheory.Comma protected theorem ind {X : C} (p : Subobject X → Prop) (h : ∀ ⦃A : C⦄ (f : A ⟶ X) [Mono f], p (Subobject.mk f)) (P : Subobject X) : p P := by apply Quotient.inductionOn' intro a exact h a.arrow protected theorem ind₂ {X : C} (p : Subobject X → Subobject X → Prop) (h : ∀ ⦃A B : C⦄ (f : A ⟶ X) (g : B ⟶ X) [Mono f] [Mono g], p (Subobject.mk f) (Subobject.mk g)) (P Q : Subobject X) : p P Q := by apply Quotient.inductionOn₂' intro a b exact h a.arrow b.arrow end /-- Declare a function on subobjects of `X` by specifying a function on monomorphisms with codomain `X`. -/ protected def lift {α : Sort} {X : C} (F : ∀ ⦃A : C⦄ (f : A ⟶ X) [Mono f], α) (h : ∀ ⦃A B : C⦄ (f : A ⟶ X) (g : B ⟶ X) [Mono f] [Mono g] (i : A ≅ B), i.hom ≫ g = f → F f = F g) : Subobject X → α := fun P => Quotient.liftOn' P (fun m => F m.arrow) fun m n ⟨i⟩ => h m.arrow n.arrow ((MonoOver.forget X ⋙ Over.forget X).mapIso i) (Over.w i.hom) @[simp] protected theorem lift_mk {α : Sort} {X : C} (F : ∀ ⦃A : C⦄ (f : A ⟶ X) [Mono f], α) {h A} (f : A ⟶ X) [Mono f] : Subobject.lift F h (Subobject.mk f) = F f := rfl /-- The category of subobjects is equivalent to the `MonoOver` category. It is more convenient to use the former due to the partial order instance, but oftentimes it is easier to define structures on the latter. -/ noncomputable def equivMonoOver (X : C) : Subobject X ≌ MonoOver X := ThinSkeleton.equivalence _ /-- Use choice to pick a representative `MonoOver X` for each `Subobject X`. -/ noncomputable def representative {X : C} : Subobject X ⥤ MonoOver X := (equivMonoOver X).functor instance : (representative (X := X)).IsEquivalence := (equivMonoOver X).isEquivalence_functor /-- Starting with `A : MonoOver X`, we can take its equivalence class in `Subobject X` then pick an arbitrary representative using `representative.obj`. This is isomorphic (in `MonoOver X`) to the original `A`. -/ noncomputable def representativeIso {X : C} (A : MonoOver X) : representative.obj ((toThinSkeleton _).obj A) ≅ A := (equivMonoOver X).counitIso.app A /-- Use choice to pick a representative underlying object in `C` for any `Subobject X`. Prefer to use the coercion `P : C` rather than explicitly writing `underlying.obj P`. -/ noncomputable def underlying {X : C} : Subobject X ⥤ C := representative ⋙ MonoOver.forget _ ⋙ Over.forget _ instance : CoeOut (Subobject X) C where coe Y := underlying.obj Y -- Porting note: removed as it has become a syntactic tautology -- @[simp] -- theorem underlying_as_coe {X : C} (P : Subobject X) : underlying.obj P = P := -- rfl /-- If we construct a `Subobject Y` from an explicit `f : X ⟶ Y` with `[Mono f]`, then pick an arbitrary choice of underlying object `(Subobject.mk f : C)` back in `C`, it is isomorphic (in `C`) to the original `X`. -/ noncomputable def underlyingIso {X Y : C} (f : X ⟶ Y) [Mono f] : (Subobject.mk f : C) ≅ X := (MonoOver.forget _ ⋙ Over.forget _).mapIso (representativeIso (MonoOver.mk' f)) /-- The morphism in `C` from the arbitrarily chosen underlying object to the ambient object. -/ noncomputable def arrow {X : C} (Y : Subobject X) : (Y : C) ⟶ X := (representative.obj Y).obj.hom instance arrow_mono {X : C} (Y : Subobject X) : Mono Y.arrow := (representative.obj Y).property @[simp] theorem arrow_congr {A : C} (X Y : Subobject A) (h : X = Y) : eqToHom (congr_arg (fun X : Subobject A => (X : C)) h) ≫ Y.arrow = X.arrow := by induction h simp @[simp] theorem representative_coe (Y : Subobject X) : (representative.obj Y : C) = (Y : C) := rfl @[simp] theorem representative_arrow (Y : Subobject X) : (representative.obj Y).arrow = Y.arrow := rfl @[reassoc (attr := simp)] theorem underlying_arrow {X : C} {Y Z : Subobject X} (f : Y ⟶ Z) : underlying.map f ≫ arrow Z = arrow Y := Over.w (representative.map f) @[reassoc (attr := simp), elementwise (attr := simp)] theorem underlyingIso_arrow {X Y : C} (f : X ⟶ Y) [Mono f] : (underlyingIso f).inv ≫ (Subobject.mk f).arrow = f := Over.w _ @[reassoc (attr := simp)] theorem underlyingIso_hom_comp_eq_mk {X Y : C} (f : X ⟶ Y) [Mono f] : (underlyingIso f).hom ≫ f = (mk f).arrow := (Iso.eq_inv_comp _).1 (underlyingIso_arrow f).symm /-- Two morphisms into a subobject are equal exactly if the morphisms into the ambient object are equal -/ @[ext] theorem eq_of_comp_arrow_eq {X Y : C} {P : Subobject Y} {f g : X ⟶ P} (h : f ≫ P.arrow = g ≫ P.arrow) : f = g := (cancel_mono P.arrow).mp h theorem mk_le_mk_of_comm {B A₁ A₂ : C} {f₁ : A₁ ⟶ B} {f₂ : A₂ ⟶ B} [Mono f₁] [Mono f₂] (g : A₁ ⟶ A₂) (w : g ≫ f₂ = f₁) : mk f₁ ≤ mk f₂ := ⟨MonoOver.homMk _ w⟩ @[simp] theorem mk_arrow (P : Subobject X) : mk P.arrow = P := Quotient.inductionOn' P fun Q => by obtain ⟨e⟩ := @Quotient.mk_out' _ (isIsomorphicSetoid _) Q exact Quotient.sound' ⟨MonoOver.isoMk (Iso.refl _) ≪≫ e⟩ theorem le_of_comm {B : C} {X Y : Subobject B} (f : (X : C) ⟶ (Y : C)) (w : f ≫ Y.arrow = X.arrow) : X ≤ Y := by convert mk_le_mk_of_comm _ w <;> simp theorem le_mk_of_comm {B A : C} {X : Subobject B} {f : A ⟶ B} [Mono f] (g : (X : C) ⟶ A) (w : g ≫ f = X.arrow) : X ≤ mk f := le_of_comm (g ≫ (underlyingIso f).inv) <\| by simp [w] theorem mk_le_of_comm {B A : C} {X : Subobject B} {f : A ⟶ B} [Mono f] (g : A ⟶ (X : C)) (w : g ≫ X.arrow = f) : mk f ≤ X := le_of_comm ((underlyingIso f).hom ≫ g) <\| by simp [w] /-- To show that two subobjects are equal, it suffices to exhibit an isomorphism commuting with the arrows. -/ @[ext (iff := false)] theorem eq_of_comm {B : C} {X Y : Subobject B} (f : (X : C) ≅ (Y : C)) (w : f.hom ≫ Y.arrow = X.arrow) : X = Y := le_antisymm (le_of_comm f.hom w) <\| le_of_comm f.inv <\| f.inv_comp_eq.2 w.symm /-- To show that two subobjects are equal, it suffices to exhibit an isomorphism commuting with the arrows. -/ theorem eq_mk_of_comm {B A : C} {X : Subobject B} (f : A ⟶ B) [Mono f] (i : (X : C) ≅ A) (w : i.hom ≫ f = X.arrow) : X = mk f := eq_of_comm (i.trans (underlyingIso f).symm) <\| by simp [w] /-- To show that two subobjects are equal, it suffices to exhibit an isomorphism commuting with the arrows. -/ theorem mk_eq_of_comm {B A : C} {X : Subobject B} (f : A ⟶ B) [Mono f] (i : A ≅ (X : C)) (w : i.hom ≫ X.arrow = f) : mk f = X := Eq.symm <\| eq_mk_of_comm _ i.symm <\| by rw [Iso.symm_hom, Iso.inv_comp_eq, w] /-- To show that two subobjects are equal, it suffices to exhibit an isomorphism commuting with the arrows. -/ theorem mk_eq_mk_of_comm {B A₁ A₂ : C} (f : A₁ ⟶ B) (g : A₂ ⟶ B) [Mono f] [Mono g] (i : A₁ ≅ A₂) (w : i.hom ≫ g = f) : mk f = mk g := eq_mk_of_comm _ ((underlyingIso f).trans i) <\| by simp [w] lemma mk_surjective {X : C} (S : Subobject X) : ∃ (A : C) (i : A ⟶ X) (_ : Mono i), S = Subobject.mk i := ⟨_, S.arrow, inferInstance, by simp⟩ -- We make `X` and `Y` explicit arguments here so that when `ofLE` appears in goal statements -- it is possible to see its source and target -- (`h` will just display as `_`, because it is in `Prop`). /-- An inequality of subobjects is witnessed by some morphism between the corresponding objects. -/ def ofLE {B : C} (X Y : Subobject B) (h : X ≤ Y) : (X : C) ⟶ (Y : C) := underlying.map <\| h.hom @[reassoc (attr := simp)] theorem ofLE_arrow {B : C} {X Y : Subobject B} (h : X ≤ Y) : ofLE X Y h ≫ Y.arrow = X.arrow := underlying_arrow _ instance {B : C} (X Y : Subobject B) (h : X ≤ Y) : Mono (ofLE X Y h) := by fconstructor intro Z f g w replace w := w =≫ Y.arrow ext simpa using w theorem ofLE_mk_le_mk_of_comm {B A₁ A₂ : C} {f₁ : A₁ ⟶ B} {f₂ : A₂ ⟶ B} [Mono f₁] [Mono f₂] (g : A₁ ⟶ A₂) (w : g ≫ f₂ = f₁) : ofLE _ _ (mk_le_mk_of_comm g w) = (underlyingIso _).hom ≫ g ≫ (underlyingIso _).inv := by ext simp [w] /-- An inequality of subobjects is witnessed by some morphism between the corresponding objects. -/ def ofLEMk {B A : C} (X : Subobject B) (f : A ⟶ B) [Mono f] (h : X ≤ mk f) : (X : C) ⟶ A := ofLE X (mk f) h ≫ (underlyingIso f).hom instance {B A : C} (X : Subobject B) (f : A ⟶ B) [Mono f] (h : X ≤ mk f) : Mono (ofLEMk X f h) := by dsimp only [ofLEMk] infer_instance @[simp] theorem ofLEMk_comp {B A : C} {X : Subobject B} {f : A ⟶ B} [Mono f] (h : X ≤ mk f) : ofLEMk X f h ≫ f = X.arrow := by simp [ofLEMk] /-- An inequality of subobjects is witnessed by some morphism between the corresponding objects. -/ def ofMkLE {B A : C} (f : A ⟶ B) [Mono f] (X : Subobject B) (h : mk f ≤ X) : A ⟶ (X : C) := (underlyingIso f).inv ≫ ofLE (mk f) X h instance {B A : C} (f : A ⟶ B) [Mono f] (X : Subobject B) (h : mk f ≤ X) : Mono (ofMkLE f X h) := by dsimp only [ofMkLE] infer_instance @[simp] theorem ofMkLE_arrow {B A : C} {f : A ⟶ B} [Mono f] {X : Subobject B} (h : mk f ≤ X) : ofMkLE f X h ≫ X.arrow = f := by simp [ofMkLE] /-- An inequality of subobjects is witnessed by some morphism between the corresponding objects. -/ def ofMkLEMk {B A₁ A₂ : C} (f : A₁ ⟶ B) (g : A₂ ⟶ B) [Mono f] [Mono g] (h : mk f ≤ mk g) : A₁ ⟶ A₂ := (underlyingIso f).inv ≫ ofLE (mk f) (mk g) h ≫ (underlyingIso g).hom instance {B A₁ A₂ : C} (f : A₁ ⟶ B) (g : A₂ ⟶ B) [Mono f] [Mono g] (h : mk f ≤ mk g) : Mono (ofMkLEMk f g h) := by dsimp only [ofMkLEMk] infer_instance @[simp] theorem ofMkLEMk_comp {B A₁ A₂ : C} {f : A₁ ⟶ B} {g : A₂ ⟶ B} [Mono f] [Mono g] (h : mk f ≤ mk g) : ofMkLEMk f g h ≫ g = f := by simp [ofMkLEMk] @[reassoc (attr := simp)] theorem ofLE_comp_ofLE {B : C} (X Y Z : Subobject B) (h₁ : X ≤ Y) (h₂ : Y ≤ Z) : ofLE X Y h₁ ≫ ofLE Y Z h₂ = ofLE X Z (h₁.trans h₂) := by simp only [ofLE, ← Functor.map_comp underlying] congr 1 @[reassoc (attr := simp)] theorem ofLE_comp_ofLEMk {B A : C} (X Y : Subobject B) (f : A ⟶ B) [Mono f] (h₁ : X ≤ Y) (h₂ : Y ≤ mk f) : ofLE X Y h₁ ≫ ofLEMk Y f h₂ = ofLEMk X f (h₁.trans h₂) := by simp only [ofMkLE, ofLEMk, ofLE, ← Functor.map_comp_assoc underlying] congr 1 @[reassoc (attr := simp)] theorem ofLEMk_comp_ofMkLE {B A : C} (X : Subobject B) (f : A ⟶ B) [Mono f] (Y : Subobject B) (h₁ : X ≤ mk f) (h₂ : mk f ≤ Y) : ofLEMk X f h₁ ≫ ofMkLE f Y h₂ = ofLE X Y (h₁.trans h₂) := by simp only [ofMkLE, ofLEMk, ofLE, ← Functor.map_comp underlying, assoc, Iso.hom_inv_id_assoc] congr 1 @[reassoc (attr := simp)] theorem ofLEMk_comp_ofMkLEMk {B A₁ A₂ : C} (X : Subobject B) (f : A₁ ⟶ B) [Mono f] (g : A₂ ⟶ B) [Mono g] (h₁ : X ≤ mk f) (h₂ : mk f ≤ mk g) : ofLEMk X f h₁ ≫ ofMkLEMk f g h₂ = ofLEMk X g (h₁.trans h₂) := by simp only [ofMkLE, ofLEMk, ofLE, ofMkLEMk, ← Functor.map_comp_assoc underlying, assoc, Iso.hom_inv_id_assoc] congr 1 @[reassoc (attr := simp)] theorem ofMkLE_comp_ofLE {B A₁ : C} (f : A₁ ⟶ B) [Mono f] (X Y : Subobject B) (h₁ : mk f ≤ X) (h₂ : X ≤ Y) : ofMkLE f X h₁ ≫ ofLE X Y h₂ = ofMkLE f Y (h₁.trans h₂) := by simp only [ofMkLE, ofLEMk, ofLE, ofMkLEMk, ← Functor.map_comp underlying, assoc] congr 1	@[reassoc (attr := simp)]	Mathlib/CategoryTheory/Subobject/Basic.lean	380	381
/- Copyright (c) 2018 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel, Johannes Hölzl, Rémy Degenne -/ import Mathlib.Order.ConditionallyCompleteLattice.Indexed import Mathlib.Order.Filter.IsBounded import Mathlib.Order.Hom.CompleteLattice /-! # liminfs and limsups of functions and filters Defines the liminf/limsup of a function taking values in a conditionally complete lattice, with respect to an arbitrary filter. We define `limsSup f` (`limsInf f`) where `f` is a filter taking values in a conditionally complete lattice. `limsSup f` is the smallest element `a` such that, eventually, `u ≤ a` (and vice versa for `limsInf f`). To work with the Limsup along a function `u` use `limsSup (map u f)`. Usually, one defines the Limsup as `inf (sup s)` where the Inf is taken over all sets in the filter. For instance, in ℕ along a function `u`, this is `inf_n (sup_{k ≥ n} u k)` (and the latter quantity decreases with `n`, so this is in fact a limit.). There is however a difficulty: it is well possible that `u` is not bounded on the whole space, only eventually (think of `limsup (fun x ↦ 1/x)` on ℝ. Then there is no guarantee that the quantity above really decreases (the value of the `sup` beforehand is not really well defined, as one can not use ∞), so that the Inf could be anything. So one can not use this `inf sup ...` definition in conditionally complete lattices, and one has to use a less tractable definition. In conditionally complete lattices, the definition is only useful for filters which are eventually bounded above (otherwise, the Limsup would morally be +∞, which does not belong to the space) and which are frequently bounded below (otherwise, the Limsup would morally be -∞, which is not in the space either). We start with definitions of these concepts for arbitrary filters, before turning to the definitions of Limsup and Liminf. In complete lattices, however, it coincides with the `Inf Sup` definition. -/ open Filter Set Function variable {α β γ ι ι' : Type*} namespace Filter section ConditionallyCompleteLattice variable [ConditionallyCompleteLattice α] {s : Set α} {u : β → α} /-- The `limsSup` of a filter `f` is the infimum of the `a` such that, eventually for `f`, holds `x ≤ a`. -/ def limsSup (f : Filter α) : α := sInf { a \| ∀ᶠ n in f, n ≤ a } /-- The `limsInf` of a filter `f` is the supremum of the `a` such that, eventually for `f`, holds `x ≥ a`. -/ def limsInf (f : Filter α) : α := sSup { a \| ∀ᶠ n in f, a ≤ n } /-- The `limsup` of a function `u` along a filter `f` is the infimum of the `a` such that, eventually for `f`, holds `u x ≤ a`. -/ def limsup (u : β → α) (f : Filter β) : α := limsSup (map u f) /-- The `liminf` of a function `u` along a filter `f` is the supremum of the `a` such that, eventually for `f`, holds `u x ≥ a`. -/ def liminf (u : β → α) (f : Filter β) : α := limsInf (map u f) /-- The `blimsup` of a function `u` along a filter `f`, bounded by a predicate `p`, is the infimum of the `a` such that, eventually for `f`, `u x ≤ a` whenever `p x` holds. -/ def blimsup (u : β → α) (f : Filter β) (p : β → Prop) := sInf { a \| ∀ᶠ x in f, p x → u x ≤ a } /-- The `bliminf` of a function `u` along a filter `f`, bounded by a predicate `p`, is the supremum of the `a` such that, eventually for `f`, `a ≤ u x` whenever `p x` holds. -/ def bliminf (u : β → α) (f : Filter β) (p : β → Prop) := sSup { a \| ∀ᶠ x in f, p x → a ≤ u x } section variable {f : Filter β} {u : β → α} {p : β → Prop} theorem limsup_eq : limsup u f = sInf { a \| ∀ᶠ n in f, u n ≤ a } := rfl theorem liminf_eq : liminf u f = sSup { a \| ∀ᶠ n in f, a ≤ u n } := rfl theorem blimsup_eq : blimsup u f p = sInf { a \| ∀ᶠ x in f, p x → u x ≤ a } := rfl theorem bliminf_eq : bliminf u f p = sSup { a \| ∀ᶠ x in f, p x → a ≤ u x } := rfl lemma liminf_comp (u : β → α) (v : γ → β) (f : Filter γ) : liminf (u ∘ v) f = liminf u (map v f) := rfl lemma limsup_comp (u : β → α) (v : γ → β) (f : Filter γ) : limsup (u ∘ v) f = limsup u (map v f) := rfl end @[simp] theorem blimsup_true (f : Filter β) (u : β → α) : (blimsup u f fun _ => True) = limsup u f := by simp [blimsup_eq, limsup_eq] @[simp] theorem bliminf_true (f : Filter β) (u : β → α) : (bliminf u f fun _ => True) = liminf u f := by simp [bliminf_eq, liminf_eq] lemma blimsup_eq_limsup {f : Filter β} {u : β → α} {p : β → Prop} : blimsup u f p = limsup u (f ⊓ 𝓟 {x \| p x}) := by simp only [blimsup_eq, limsup_eq, eventually_inf_principal, mem_setOf_eq] lemma bliminf_eq_liminf {f : Filter β} {u : β → α} {p : β → Prop} : bliminf u f p = liminf u (f ⊓ 𝓟 {x \| p x}) := blimsup_eq_limsup (α := αᵒᵈ) theorem blimsup_eq_limsup_subtype {f : Filter β} {u : β → α} {p : β → Prop} : blimsup u f p = limsup (u ∘ ((↑) : { x \| p x } → β)) (comap (↑) f) := by rw [blimsup_eq_limsup, limsup, limsup, ← map_map, map_comap_setCoe_val] theorem bliminf_eq_liminf_subtype {f : Filter β} {u : β → α} {p : β → Prop} : bliminf u f p = liminf (u ∘ ((↑) : { x \| p x } → β)) (comap (↑) f) := blimsup_eq_limsup_subtype (α := αᵒᵈ) theorem limsSup_le_of_le {f : Filter α} {a} (hf : f.IsCobounded (· ≤ ·) := by isBoundedDefault) (h : ∀ᶠ n in f, n ≤ a) : limsSup f ≤ a := csInf_le hf h theorem le_limsInf_of_le {f : Filter α} {a} (hf : f.IsCobounded (· ≥ ·) := by isBoundedDefault) (h : ∀ᶠ n in f, a ≤ n) : a ≤ limsInf f := le_csSup hf h theorem limsup_le_of_le {f : Filter β} {u : β → α} {a} (hf : f.IsCoboundedUnder (· ≤ ·) u := by isBoundedDefault) (h : ∀ᶠ n in f, u n ≤ a) : limsup u f ≤ a := csInf_le hf h theorem le_liminf_of_le {f : Filter β} {u : β → α} {a} (hf : f.IsCoboundedUnder (· ≥ ·) u := by isBoundedDefault) (h : ∀ᶠ n in f, a ≤ u n) : a ≤ liminf u f := le_csSup hf h theorem le_limsSup_of_le {f : Filter α} {a} (hf : f.IsBounded (· ≤ ·) := by isBoundedDefault) (h : ∀ b, (∀ᶠ n in f, n ≤ b) → a ≤ b) : a ≤ limsSup f := le_csInf hf h theorem limsInf_le_of_le {f : Filter α} {a} (hf : f.IsBounded (· ≥ ·) := by isBoundedDefault) (h : ∀ b, (∀ᶠ n in f, b ≤ n) → b ≤ a) : limsInf f ≤ a := csSup_le hf h theorem le_limsup_of_le {f : Filter β} {u : β → α} {a} (hf : f.IsBoundedUnder (· ≤ ·) u := by isBoundedDefault) (h : ∀ b, (∀ᶠ n in f, u n ≤ b) → a ≤ b) : a ≤ limsup u f := le_csInf hf h theorem liminf_le_of_le {f : Filter β} {u : β → α} {a} (hf : f.IsBoundedUnder (· ≥ ·) u := by isBoundedDefault) (h : ∀ b, (∀ᶠ n in f, b ≤ u n) → b ≤ a) : liminf u f ≤ a := csSup_le hf h theorem limsInf_le_limsSup {f : Filter α} [NeBot f] (h₁ : f.IsBounded (· ≤ ·) := by isBoundedDefault) (h₂ : f.IsBounded (· ≥ ·) := by isBoundedDefault) : limsInf f ≤ limsSup f :=	liminf_le_of_le h₂ fun a₀ ha₀ => le_limsup_of_le h₁ fun a₁ ha₁ => show a₀ ≤ a₁ from let ⟨_, hb₀, hb₁⟩ := (ha₀.and ha₁).exists le_trans hb₀ hb₁	Mathlib/Order/LiminfLimsup.lean	170	175
/- Copyright (c) 2020 Anne Baanen. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Anne Baanen, Eric Wieser -/ import Mathlib.Algebra.Group.Fin.Tuple import Mathlib.Data.Matrix.RowCol import Mathlib.Data.Fin.VecNotation import Mathlib.Tactic.FinCases import Mathlib.Algebra.BigOperators.Fin /-! # Matrix and vector notation This file includes `simp` lemmas for applying operations in `Data.Matrix.Basic` to values built out of the matrix notation `![a, b] = vecCons a (vecCons b vecEmpty)` defined in `Data.Fin.VecNotation`. This also provides the new notation `!![a, b; c, d] = Matrix.of ![![a, b], ![c, d]]`. This notation also works for empty matrices; `!![,,,] : Matrix (Fin 0) (Fin 3)` and `!![;;;] : Matrix (Fin 3) (Fin 0)`. ## Implementation notes The `simp` lemmas require that one of the arguments is of the form `vecCons _ _`. This ensures `simp` works with entries only when (some) entries are already given. In other words, this notation will only appear in the output of `simp` if it already appears in the input. ## Notations This file provide notation `!![a, b; c, d]` for matrices, which corresponds to `Matrix.of ![![a, b], ![c, d]]`. ## Examples Examples of usage can be found in the `MathlibTest/matrix.lean` file. -/ namespace Matrix universe u uₘ uₙ uₒ variable {α : Type u} {o n m : ℕ} {m' : Type uₘ} {n' : Type uₙ} {o' : Type uₒ} open Matrix section toExpr open Lean Qq open Qq in /-- `Matrix.mkLiteralQ !![a, b; c, d]` produces the term `q(!![$a, $b; $c, $d])`. -/ def mkLiteralQ {u : Level} {α : Q(Type u)} {m n : Nat} (elems : Matrix (Fin m) (Fin n) Q($α)) : Q(Matrix (Fin $m) (Fin $n) $α) := let elems := PiFin.mkLiteralQ (α := q(Fin $n → $α)) fun i => PiFin.mkLiteralQ fun j => elems i j q(Matrix.of $elems) /-- Matrices can be reflected whenever their entries can. We insert a `Matrix.of` to prevent immediate decay to a function. -/ protected instance toExpr [ToLevel.{u}] [ToLevel.{uₘ}] [ToLevel.{uₙ}] [Lean.ToExpr α] [Lean.ToExpr m'] [Lean.ToExpr n'] [Lean.ToExpr (m' → n' → α)] : Lean.ToExpr (Matrix m' n' α) := have eα : Q(Type $(toLevel.{u})) := toTypeExpr α have em' : Q(Type $(toLevel.{uₘ})) := toTypeExpr m' have en' : Q(Type $(toLevel.{uₙ})) := toTypeExpr n' { toTypeExpr := q(Matrix $eα $em' $en') toExpr := fun M => have eM : Q($em' → $en' → $eα) := toExpr (show m' → n' → α from M) q(Matrix.of $eM) } end toExpr section Parser open Lean Meta Elab Term Macro TSyntax PrettyPrinter.Delaborator SubExpr /-- Notation for m×n matrices, aka `Matrix (Fin m) (Fin n) α`. For instance: * `!![a, b, c; d, e, f]` is the matrix with two rows and three columns, of type `Matrix (Fin 2) (Fin 3) α` * `!![a, b, c]` is a row vector of type `Matrix (Fin 1) (Fin 3) α` (see also `Matrix.row`). * `!![a; b; c]` is a column vector of type `Matrix (Fin 3) (Fin 1) α` (see also `Matrix.col`). This notation implements some special cases: * `![,,]`, with `n` `,`s, is a term of type `Matrix (Fin 0) (Fin n) α` * `![;;]`, with `m` `;`s, is a term of type `Matrix (Fin m) (Fin 0) α` * `![]` is the 0×0 matrix Note that vector notation is provided elsewhere (by `Matrix.vecNotation`) as `![a, b, c]`. Under the hood, `!![a, b, c; d, e, f]` is syntax for `Matrix.of ![![a, b, c], ![d, e, f]]`. -/ syntax (name := matrixNotation) "!![" ppRealGroup(sepBy1(ppGroup(term,+,?), ";", "; ", allowTrailingSep)) "]" : term @[inherit_doc matrixNotation] syntax (name := matrixNotationRx0) "!![" ";"+ "]" : term @[inherit_doc matrixNotation] syntax (name := matrixNotation0xC) "!![" ","* "]" : term macro_rules \| `(!![$[$[$rows],];]) => do let m := rows.size let n := if h : 0 < m then rows[0].size else 0 let rowVecs ← rows.mapM fun row : Array Term => do unless row.size = n do Macro.throwErrorAt (mkNullNode row) s!"\ Rows must be of equal length; this row has {row.size} items, \ the previous rows have {n}" `(![$row,]) `(@Matrix.of (Fin $(quote m)) (Fin $(quote n)) _ ![$rowVecs,]) \| `(!![$[;%$semicolons]]) => do let emptyVec ← `(![]) let emptyVecs := semicolons.map (fun _ => emptyVec) `(@Matrix.of (Fin $(quote semicolons.size)) (Fin 0) _ ![$emptyVecs,]) \| `(!![$[,%$commas]]) => `(@Matrix.of (Fin 0) (Fin $(quote commas.size)) _ ![]) /-- Delaborator for the `!![]` notation. -/ @[app_delab DFunLike.coe] def delabMatrixNotation : Delab := whenNotPPOption getPPExplicit <\| whenPPOption getPPNotation <\| withOverApp 6 do let mkApp3 (.const ``Matrix.of _) (.app (.const ``Fin _) em) (.app (.const ``Fin _) en) _ := (← getExpr).appFn!.appArg! \| failure let some m ← withNatValue em (pure ∘ some) \| failure let some n ← withNatValue en (pure ∘ some) \| failure withAppArg do if m = 0 then guard <\| (← getExpr).isAppOfArity ``vecEmpty 1 let commas := .replicate n (mkAtom ",") `(!![$[,%$commas]]) else if n = 0 then let `(![$[![]%$evecs],]) ← delab \| failure `(!![$[;%$evecs]]) else let `(![$[![$[$melems],]],]) ← delab \| failure `(!![$[$[$melems],];]) end Parser variable (a b : ℕ) /-- Use `![...]` notation for displaying a `Fin`-indexed matrix, for example: ``` #eval !![1, 2; 3, 4] + !![3, 4; 5, 6] -- !![4, 6; 8, 10] ``` -/ instance repr [Repr α] : Repr (Matrix (Fin m) (Fin n) α) where reprPrec f _p := (Std.Format.bracket "!![" · "]") <\| (Std.Format.joinSep · (";" ++ Std.Format.line)) <\| (List.finRange m).map fun i => Std.Format.fill <\| -- wrap line in a single place rather than all at once (Std.Format.joinSep · ("," ++ Std.Format.line)) <\| (List.finRange n).map fun j => _root_.repr (f i j) @[simp] theorem cons_val' (v : n' → α) (B : Fin m → n' → α) (i j) : vecCons v B i j = vecCons (v j) (fun i => B i j) i := by refine Fin.cases ?_ ?_ i <;> simp @[simp] theorem head_val' (B : Fin m.succ → n' → α) (j : n') : (vecHead fun i => B i j) = vecHead B j := rfl @[simp] theorem tail_val' (B : Fin m.succ → n' → α) (j : n') : (vecTail fun i => B i j) = fun i => vecTail B i j := rfl section DotProduct variable [AddCommMonoid α] [Mul α] @[simp] theorem dotProduct_empty (v w : Fin 0 → α) : dotProduct v w = 0 := Finset.sum_empty @[simp] theorem cons_dotProduct (x : α) (v : Fin n → α) (w : Fin n.succ → α) : dotProduct (vecCons x v) w = x * vecHead w + dotProduct v (vecTail w) := by simp [dotProduct, Fin.sum_univ_succ, vecHead, vecTail] @[simp] theorem dotProduct_cons (v : Fin n.succ → α) (x : α) (w : Fin n → α) : dotProduct v (vecCons x w) = vecHead v * x + dotProduct (vecTail v) w := by simp [dotProduct, Fin.sum_univ_succ, vecHead, vecTail] theorem cons_dotProduct_cons (x : α) (v : Fin n → α) (y : α) (w : Fin n → α) : dotProduct (vecCons x v) (vecCons y w) = x * y + dotProduct v w := by simp end DotProduct section ColRow variable {ι : Type} @[simp] theorem replicateCol_empty (v : Fin 0 → α) : replicateCol ι v = vecEmpty := empty_eq _ @[deprecated (since := "2025-03-20")] alias col_empty := replicateCol_empty @[simp] theorem replicateCol_cons (x : α) (u : Fin m → α) : replicateCol ι (vecCons x u) = of (vecCons (fun _ => x) (replicateCol ι u)) := by ext i j refine Fin.cases ?_ ?_ i <;> simp [vecHead, vecTail] @[deprecated (since := "2025-03-20")] alias col_cons := replicateCol_cons @[simp] theorem replicateRow_empty : replicateRow ι (vecEmpty : Fin 0 → α) = of fun _ => vecEmpty := rfl @[deprecated (since := "2025-03-20")] alias row_empty := replicateRow_empty @[simp] theorem replicateRow_cons (x : α) (u : Fin m → α) : replicateRow ι (vecCons x u) = of fun _ => vecCons x u := rfl @[deprecated (since := "2025-03-20")] alias row_cons := replicateRow_cons end ColRow section Transpose @[simp] theorem transpose_empty_rows (A : Matrix m' (Fin 0) α) : Aᵀ = of ![] := empty_eq _ @[simp] theorem transpose_empty_cols (A : Matrix (Fin 0) m' α) : Aᵀ = of fun _ => ![] := funext fun _ => empty_eq _ @[simp] theorem cons_transpose (v : n' → α) (A : Matrix (Fin m) n' α) : (of (vecCons v A))ᵀ = of fun i => vecCons (v i) (Aᵀ i) := by ext i j refine Fin.cases ?_ ?_ j <;> simp @[simp] theorem head_transpose (A : Matrix m' (Fin n.succ) α) : vecHead (of.symm Aᵀ) = vecHead ∘ of.symm A := rfl @[simp] theorem tail_transpose (A : Matrix m' (Fin n.succ) α) : vecTail (of.symm Aᵀ) = (vecTail ∘ A)ᵀ := by ext i j rfl end Transpose section Mul variable [NonUnitalNonAssocSemiring α] @[simp] theorem empty_mul [Fintype n'] (A : Matrix (Fin 0) n' α) (B : Matrix n' o' α) : A B = of ![] := empty_eq _ @[simp] theorem empty_mul_empty (A : Matrix m' (Fin 0) α) (B : Matrix (Fin 0) o' α) : A * B = 0 := rfl @[simp] theorem mul_empty [Fintype n'] (A : Matrix m' n' α) (B : Matrix n' (Fin 0) α) : A * B = of fun _ => ![] := funext fun _ => empty_eq _ theorem mul_val_succ [Fintype n'] (A : Matrix (Fin m.succ) n' α) (B : Matrix n' o' α) (i : Fin m) (j : o') : (A * B) i.succ j = (of (vecTail (of.symm A)) * B) i j := rfl @[simp] theorem cons_mul [Fintype n'] (v : n' → α) (A : Fin m → n' → α) (B : Matrix n' o' α) : of (vecCons v A) * B = of (vecCons (v ᵥ* B) (of.symm (of A * B))) := by ext i j refine Fin.cases ?_ ?_ i · rfl simp [mul_val_succ] end Mul section VecMul variable [NonUnitalNonAssocSemiring α] @[simp] theorem empty_vecMul (v : Fin 0 → α) (B : Matrix (Fin 0) o' α) : v ᵥ* B = 0 := rfl @[simp] theorem vecMul_empty [Fintype n'] (v : n' → α) (B : Matrix n' (Fin 0) α) : v ᵥ* B = ![] := empty_eq _ @[simp] theorem cons_vecMul (x : α) (v : Fin n → α) (B : Fin n.succ → o' → α) : vecCons x v ᵥ* of B = x • vecHead B + v ᵥ* of (vecTail B) := by ext i simp [vecMul] @[simp] theorem vecMul_cons (v : Fin n.succ → α) (w : o' → α) (B : Fin n → o' → α) : v ᵥ* of (vecCons w B) = vecHead v • w + vecTail v ᵥ* of B := by ext i simp [vecMul] theorem cons_vecMul_cons (x : α) (v : Fin n → α) (w : o' → α) (B : Fin n → o' → α) : vecCons x v ᵥ* of (vecCons w B) = x • w + v ᵥ* of B := by simp end VecMul section MulVec variable [NonUnitalNonAssocSemiring α] @[simp] theorem empty_mulVec [Fintype n'] (A : Matrix (Fin 0) n' α) (v : n' → α) : A ᵥ v = ![] := empty_eq _ @[simp] theorem mulVec_empty (A : Matrix m' (Fin 0) α) (v : Fin 0 → α) : A ᵥ v = 0 := rfl @[simp] theorem cons_mulVec [Fintype n'] (v : n' → α) (A : Fin m → n' → α) (w : n' → α) : (of <\| vecCons v A) ᵥ w = vecCons (dotProduct v w) (of A ᵥ w) := by ext i refine Fin.cases ?_ ?_ i <;> simp [mulVec]	@[simp] theorem mulVec_cons {α} [NonUnitalCommSemiring α] (A : m' → Fin n.succ → α) (x : α) (v : Fin n → α) : (of A) ᵥ (vecCons x v) = x • vecHead ∘ A + (of (vecTail ∘ A)) ᵥ v := by ext i	Mathlib/Data/Matrix/Notation.lean	333	336
/- 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.HurwitzZetaEven import Mathlib.NumberTheory.LSeries.HurwitzZetaOdd import Mathlib.Analysis.SpecialFunctions.Gamma.Beta /-! # The Hurwitz zeta function This file gives the definition and properties of the following two functions: * The Hurwitz zeta function, which is the meromorphic continuation to all `s ∈ ℂ` of the function defined for `1 < re s` by the series `∑' n, 1 / (n + a) ^ s` for a parameter `a ∈ ℝ`, with the sum taken over all `n` such that `n + a > 0`; * the related sum, which we call the "exponential zeta function" (does it have a standard name?) `∑' n : ℕ, exp (2 * π * I * n * a) / n ^ s`. ## Main definitions and results * `hurwitzZeta`: the Hurwitz zeta function (defined to be periodic in `a` with period 1) * `expZeta`: the exponential zeta function * `hasSum_hurwitzZeta_of_one_lt_re` and `hasSum_expZeta_of_one_lt_re`: relation to Dirichlet series for `1 < re s` * ` hurwitzZeta_residue_one` shows that the residue at `s = 1` equals `1` * `differentiableAt_hurwitzZeta` and `differentiableAt_expZeta`: analyticity away from `s = 1` * `hurwitzZeta_one_sub` and `expZeta_one_sub`: functional equations `s ↔ 1 - s`. -/ open Set Real Complex Filter Topology namespace HurwitzZeta /-! ## The Hurwitz zeta function -/ /-- The Hurwitz zeta function, which is the meromorphic continuation of `∑ (n : ℕ), 1 / (n + a) ^ s` if `0 ≤ a ≤ 1`. See `hasSum_hurwitzZeta_of_one_lt_re` for the relation to the Dirichlet series in the convergence range. -/ noncomputable def hurwitzZeta (a : UnitAddCircle) (s : ℂ) := hurwitzZetaEven a s + hurwitzZetaOdd a s lemma hurwitzZetaEven_eq (a : UnitAddCircle) (s : ℂ) : hurwitzZetaEven a s = (hurwitzZeta a s + hurwitzZeta (-a) s) / 2 := by simp only [hurwitzZeta, hurwitzZetaEven_neg, hurwitzZetaOdd_neg] ring_nf lemma hurwitzZetaOdd_eq (a : UnitAddCircle) (s : ℂ) : hurwitzZetaOdd a s = (hurwitzZeta a s - hurwitzZeta (-a) s) / 2 := by simp only [hurwitzZeta, hurwitzZetaEven_neg, hurwitzZetaOdd_neg] ring_nf /-- The Hurwitz zeta function is differentiable away from `s = 1`. -/ lemma differentiableAt_hurwitzZeta (a : UnitAddCircle) {s : ℂ} (hs : s ≠ 1) : DifferentiableAt ℂ (hurwitzZeta a) s := (differentiableAt_hurwitzZetaEven a hs).add (differentiable_hurwitzZetaOdd a s) /-- Formula for `hurwitzZeta s` as a Dirichlet series in the convergence range. We restrict to `a ∈ Icc 0 1` to simplify the statement. -/ lemma hasSum_hurwitzZeta_of_one_lt_re {a : ℝ} (ha : a ∈ Icc 0 1) {s : ℂ} (hs : 1 < re s) : HasSum (fun n : ℕ ↦ 1 / (n + a : ℂ) ^ s) (hurwitzZeta a s) := by convert (hasSum_nat_hurwitzZetaEven_of_mem_Icc ha hs).add (hasSum_nat_hurwitzZetaOdd_of_mem_Icc ha hs) using 1 ext1 n -- plain `ring_nf` works here, but the following is faster: apply show ∀ (x y : ℂ), x = (x + y) / 2 + (x - y) / 2 by intros; ring /-- The residue of the Hurwitz zeta function at `s = 1` is `1`. -/ lemma hurwitzZeta_residue_one (a : UnitAddCircle) : Tendsto (fun s ↦ (s - 1) * hurwitzZeta a s) (𝓝[≠] 1) (𝓝 1) := by simp only [hurwitzZeta, mul_add, (by simp : 𝓝 (1 : ℂ) = 𝓝 (1 + (1 - 1) * hurwitzZetaOdd a 1))] refine (hurwitzZetaEven_residue_one a).add ((Tendsto.mul ?_ ?_).mono_left nhdsWithin_le_nhds) exacts [tendsto_id.sub_const _, (differentiable_hurwitzZetaOdd a).continuous.tendsto _] lemma differentiableAt_hurwitzZeta_sub_one_div (a : UnitAddCircle) : DifferentiableAt ℂ (fun s ↦ hurwitzZeta a s - 1 / (s - 1) / Gammaℝ s) 1 := by simp only [hurwitzZeta, add_sub_right_comm] exact (differentiableAt_hurwitzZetaEven_sub_one_div a).add (differentiable_hurwitzZetaOdd a 1) /-- Expression for `hurwitzZeta a 1` as a limit. (Mathematically `hurwitzZeta a 1` is undefined, but our construction assigns some value to it; this lemma is mostly of interest for determining what that value is). -/ lemma tendsto_hurwitzZeta_sub_one_div_nhds_one (a : UnitAddCircle) : Tendsto (fun s ↦ hurwitzZeta a s - 1 / (s - 1) / Gammaℝ s) (𝓝 1) (𝓝 (hurwitzZeta a 1)) := by simp only [hurwitzZeta, add_sub_right_comm] refine (tendsto_hurwitzZetaEven_sub_one_div_nhds_one a).add (differentiable_hurwitzZetaOdd a 1).continuousAt.tendsto /-- The difference of two Hurwitz zeta functions is differentiable everywhere. -/ lemma differentiable_hurwitzZeta_sub_hurwitzZeta (a b : UnitAddCircle) : Differentiable ℂ (fun s ↦ hurwitzZeta a s - hurwitzZeta b s) := by simp only [hurwitzZeta, add_sub_add_comm] refine (differentiable_hurwitzZetaEven_sub_hurwitzZetaEven a b).add (.sub ?_ ?_) all_goals apply differentiable_hurwitzZetaOdd /-! ## The exponential zeta function -/ /-- Meromorphic continuation of the series `∑' (n : ℕ), exp (2 * π * I * a * n) / n ^ s`. See `hasSum_expZeta_of_one_lt_re` for the relation to the Dirichlet series. -/ noncomputable def expZeta (a : UnitAddCircle) (s : ℂ) := cosZeta a s + I * sinZeta a s lemma cosZeta_eq (a : UnitAddCircle) (s : ℂ) : cosZeta a s = (expZeta a s + expZeta (-a) s) / 2 := by rw [expZeta, expZeta, cosZeta_neg, sinZeta_neg] ring_nf lemma sinZeta_eq (a : UnitAddCircle) (s : ℂ) : sinZeta a s = (expZeta a s - expZeta (-a) s) / (2 * I) := by rw [expZeta, expZeta, cosZeta_neg, sinZeta_neg] field_simp ring_nf lemma hasSum_expZeta_of_one_lt_re (a : ℝ) {s : ℂ} (hs : 1 < re s) : HasSum (fun n : ℕ ↦ cexp (2 * π * I * a * n) / n ^ s) (expZeta a s) := by convert (hasSum_nat_cosZeta a hs).add ((hasSum_nat_sinZeta a hs).mul_left I) using 1 ext1 n simp only [mul_right_comm _ I, ← cos_add_sin_I, push_cast] rw [add_div, mul_div, mul_comm _ I] lemma differentiableAt_expZeta (a : UnitAddCircle) (s : ℂ) (hs : s ≠ 1 ∨ a ≠ 0) : DifferentiableAt ℂ (expZeta a) s := by apply DifferentiableAt.add · exact differentiableAt_cosZeta a hs · apply (differentiableAt_const _).mul (differentiableAt_sinZeta a s) /-- If `a ≠ 0` then the exponential zeta function is analytic everywhere. -/ lemma differentiable_expZeta_of_ne_zero {a : UnitAddCircle} (ha : a ≠ 0) : Differentiable ℂ (expZeta a) := (differentiableAt_expZeta a · (Or.inr ha)) /-- Reformulation of `hasSum_expZeta_of_one_lt_re` using `LSeriesHasSum`. -/ lemma LSeriesHasSum_exp (a : ℝ) {s : ℂ} (hs : 1 < re s) : LSeriesHasSum (cexp <\| 2 * π * I * a * ·) s (expZeta a s) := (hasSum_expZeta_of_one_lt_re a hs).congr_fun (LSeries.term_of_ne_zero' (ne_zero_of_one_lt_re hs) _) /-! ## The functional equation -/ lemma hurwitzZeta_one_sub (a : UnitAddCircle) {s : ℂ} (hs : ∀ (n : ℕ), s ≠ -n) (hs' : a ≠ 0 ∨ s ≠ 1) :	hurwitzZeta a (1 - s) = (2 * π) ^ (-s) * Gamma s * (exp (-π * I * s / 2) * expZeta a s + exp (π * I * s / 2) * expZeta (-a) s) := by rw [hurwitzZeta, hurwitzZetaEven_one_sub a hs hs', hurwitzZetaOdd_one_sub a hs, expZeta, expZeta, Complex.cos, Complex.sin, sinZeta_neg, cosZeta_neg] rw [show ↑π * I * s / 2 = ↑π * s / 2 * I by ring, show -↑π * I * s / 2 = -(↑π * s / 2) * I by ring] -- these `generalize` commands are not strictly needed for the `ring_nf` call to succeed, but -- make it run faster: generalize (2 * π : ℂ) ^ (-s) = x generalize (↑π * s / 2 * I).exp = y generalize (-(↑π * s / 2) * I).exp = z ring_nf /-- Functional equation for the exponential zeta function. -/	Mathlib/NumberTheory/LSeries/HurwitzZeta.lean	155	168
/- Copyright (c) 2019 Neil Strickland. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Neil Strickland -/ import Mathlib.Tactic.Ring import Mathlib.Data.PNat.Prime /-! # Euclidean algorithm for ℕ This file sets up a version of the Euclidean algorithm that only works with natural numbers. Given `0 < a, b`, it computes the unique `(w, x, y, z, d)` such that the following identities hold: * `a = (w + x) d` * `b = (y + z) d` * `w * z = x * y + 1` `d` is then the gcd of `a` and `b`, and `a' := a / d = w + x` and `b' := b / d = y + z` are coprime. This story is closely related to the structure of SL₂(ℕ) (as a free monoid on two generators) and the theory of continued fractions. ## Main declarations * `XgcdType`: Helper type in defining the gcd. Encapsulates `(wp, x, y, zp, ap, bp)`. where `wp` `zp`, `ap`, `bp` are the variables getting changed through the algorithm. * `IsSpecial`: States `wp * zp = x * y + 1` * `IsReduced`: States `ap = a ∧ bp = b` ## Notes See `Nat.Xgcd` for a very similar algorithm allowing values in `ℤ`. -/ open Nat namespace PNat /-- A term of `XgcdType` is a system of six naturals. They should be thought of as representing the matrix [[w, x], [y, z]] = [[wp + 1, x], [y, zp + 1]] together with the vector [a, b] = [ap + 1, bp + 1]. -/ structure XgcdType where /-- `wp` is a variable which changes through the algorithm. -/ wp : ℕ /-- `x` satisfies `a / d = w + x` at the final step. -/ x : ℕ /-- `y` satisfies `b / d = z + y` at the final step. -/ y : ℕ /-- `zp` is a variable which changes through the algorithm. -/ zp : ℕ /-- `ap` is a variable which changes through the algorithm. -/ ap : ℕ /-- `bp` is a variable which changes through the algorithm. -/ bp : ℕ deriving Inhabited namespace XgcdType variable (u : XgcdType) instance : SizeOf XgcdType := ⟨fun u => u.bp⟩ /-- The `Repr` instance converts terms to strings in a way that reflects the matrix/vector interpretation as above. -/ instance : Repr XgcdType where reprPrec \| g, _ => s!"[[[{repr (g.wp + 1)}, {repr g.x}], \ [{repr g.y}, {repr (g.zp + 1)}]], \ [{repr (g.ap + 1)}, {repr (g.bp + 1)}]]" /-- Another `mk` using ℕ and ℕ+ -/ def mk' (w : ℕ+) (x : ℕ) (y : ℕ) (z : ℕ+) (a : ℕ+) (b : ℕ+) : XgcdType := mk w.val.pred x y z.val.pred a.val.pred b.val.pred /-- `w = wp + 1` -/ def w : ℕ+ := succPNat u.wp /-- `z = zp + 1` -/ def z : ℕ+ := succPNat u.zp /-- `a = ap + 1` -/ def a : ℕ+ := succPNat u.ap /-- `b = bp + 1` -/ def b : ℕ+ := succPNat u.bp /-- `r = a % b`: remainder -/ def r : ℕ := (u.ap + 1) % (u.bp + 1) /-- `q = ap / bp`: quotient -/ def q : ℕ := (u.ap + 1) / (u.bp + 1) /-- `qp = q - 1` -/ def qp : ℕ := u.q - 1 /-- The map `v` gives the product of the matrix [[w, x], [y, z]] = [[wp + 1, x], [y, zp + 1]] and the vector [a, b] = [ap + 1, bp + 1]. The map `vp` gives [sp, tp] such that v = [sp + 1, tp + 1]. -/ def vp : ℕ × ℕ := ⟨u.wp + u.x + u.ap + u.wp * u.ap + u.x * u.bp, u.y + u.zp + u.bp + u.y * u.ap + u.zp * u.bp⟩ /-- `v = [sp + 1, tp + 1]`, check `vp` -/ def v : ℕ × ℕ := ⟨u.w * u.a + u.x * u.b, u.y * u.a + u.z * u.b⟩ /-- `succ₂ [t.1, t.2] = [t.1.succ, t.2.succ]` -/ def succ₂ (t : ℕ × ℕ) : ℕ × ℕ := ⟨t.1.succ, t.2.succ⟩ theorem v_eq_succ_vp : u.v = succ₂ u.vp := by ext <;> dsimp [v, vp, w, z, a, b, succ₂] <;> ring_nf /-- `IsSpecial` holds if the matrix has determinant one. -/ def IsSpecial : Prop := u.wp + u.zp + u.wp * u.zp = u.x * u.y /-- `IsSpecial'` is an alternative of `IsSpecial`. -/ def IsSpecial' : Prop := u.w * u.z = succPNat (u.x * u.y) theorem isSpecial_iff : u.IsSpecial ↔ u.IsSpecial' := by dsimp [IsSpecial, IsSpecial'] let ⟨wp, x, y, zp, ap, bp⟩ := u constructor <;> intro h <;> simp only [w, succPNat, succ_eq_add_one, z] at * <;> simp only [← coe_inj, mul_coe, mk_coe] at * · simp_all [← h]; ring · simp [Nat.mul_add, Nat.add_mul, ← Nat.add_assoc] at h; rw [← h]; ring /-- `IsReduced` holds if the two entries in the vector are the same. The reduction algorithm will produce a system with this property, whose product vector is the same as for the original system. -/ def IsReduced : Prop := u.ap = u.bp /-- `IsReduced'` is an alternative of `IsReduced`. -/ def IsReduced' : Prop := u.a = u.b theorem isReduced_iff : u.IsReduced ↔ u.IsReduced' := succPNat_inj.symm /-- `flip` flips the placement of variables during the algorithm. -/ def flip : XgcdType where wp := u.zp x := u.y y := u.x zp := u.wp ap := u.bp bp := u.ap @[simp] theorem flip_w : (flip u).w = u.z := rfl @[simp] theorem flip_x : (flip u).x = u.y := rfl @[simp] theorem flip_y : (flip u).y = u.x := rfl @[simp] theorem flip_z : (flip u).z = u.w := rfl @[simp] theorem flip_a : (flip u).a = u.b := rfl @[simp] theorem flip_b : (flip u).b = u.a := rfl theorem flip_isReduced : (flip u).IsReduced ↔ u.IsReduced := by dsimp [IsReduced, flip] constructor <;> intro h <;> exact h.symm theorem flip_isSpecial : (flip u).IsSpecial ↔ u.IsSpecial := by dsimp [IsSpecial, flip] rw [mul_comm u.x, mul_comm u.zp, add_comm u.zp] theorem flip_v : (flip u).v = u.v.swap := by dsimp [v] ext · simp only ring · simp only ring /-- Properties of division with remainder for a / b. -/ theorem rq_eq : u.r + (u.bp + 1) * u.q = u.ap + 1 := Nat.mod_add_div (u.ap + 1) (u.bp + 1) theorem qp_eq (hr : u.r = 0) : u.q = u.qp + 1 := by by_cases hq : u.q = 0 · let h := u.rq_eq rw [hr, hq, mul_zero, add_zero] at h cases h · exact (Nat.succ_pred_eq_of_pos (Nat.pos_of_ne_zero hq)).symm /-- The following function provides the starting point for our algorithm. We will apply an iterative reduction process to it, which will produce a system satisfying IsReduced. The gcd can be read off from this final system. -/ def start (a b : ℕ+) : XgcdType := ⟨0, 0, 0, 0, a - 1, b - 1⟩ theorem start_isSpecial (a b : ℕ+) : (start a b).IsSpecial := by dsimp [start, IsSpecial] theorem start_v (a b : ℕ+) : (start a b).v = ⟨a, b⟩ := by dsimp [start, v, XgcdType.a, XgcdType.b, w, z] rw [one_mul, one_mul, zero_mul, zero_mul] have := a.pos have := b.pos congr <;> omega /-- `finish` happens when the reducing process ends. -/ def finish : XgcdType := XgcdType.mk u.wp ((u.wp + 1) * u.qp + u.x) u.y (u.y * u.qp + u.zp) u.bp u.bp theorem finish_isReduced : u.finish.IsReduced := by dsimp [IsReduced] rfl theorem finish_isSpecial (hs : u.IsSpecial) : u.finish.IsSpecial := by dsimp [IsSpecial, finish] at hs ⊢ rw [add_mul _ _ u.y, add_comm _ (u.x * u.y), ← hs] ring theorem finish_v (hr : u.r = 0) : u.finish.v = u.v := by let ha : u.r + u.b * u.q = u.a := u.rq_eq rw [hr, zero_add] at ha ext · change (u.wp + 1) * u.b + ((u.wp + 1) * u.qp + u.x) * u.b = u.w * u.a + u.x * u.b have : u.wp + 1 = u.w := rfl rw [this, ← ha, u.qp_eq hr] ring · change u.y * u.b + (u.y * u.qp + u.z) * u.b = u.y * u.a + u.z * u.b rw [← ha, u.qp_eq hr] ring /-- This is the main reduction step, which is used when u.r ≠ 0, or equivalently b does not divide a. -/ def step : XgcdType := XgcdType.mk (u.y * u.q + u.zp) u.y ((u.wp + 1) * u.q + u.x) u.wp u.bp (u.r - 1) /-- We will apply the above step recursively. The following result is used to ensure that the process terminates. -/ theorem step_wf (hr : u.r ≠ 0) : SizeOf.sizeOf u.step < SizeOf.sizeOf u := by change u.r - 1 < u.bp have h₀ : u.r - 1 + 1 = u.r := Nat.succ_pred_eq_of_pos (Nat.pos_of_ne_zero hr) have h₁ : u.r < u.bp + 1 := Nat.mod_lt (u.ap + 1) u.bp.succ_pos rw [← h₀] at h₁ exact lt_of_succ_lt_succ h₁ theorem step_isSpecial (hs : u.IsSpecial) : u.step.IsSpecial := by dsimp [IsSpecial, step] at hs ⊢ rw [mul_add, mul_comm u.y u.x, ← hs] ring /-- The reduction step does not change the product vector. -/ theorem step_v (hr : u.r ≠ 0) : u.step.v = u.v.swap := by let ha : u.r + u.b * u.q = u.a := u.rq_eq let hr : u.r - 1 + 1 = u.r := (add_comm _ 1).trans (add_tsub_cancel_of_le (Nat.pos_of_ne_zero hr)) ext · change ((u.y * u.q + u.z) * u.b + u.y * (u.r - 1 + 1) : ℕ) = u.y * u.a + u.z * u.b rw [← ha, hr] ring · change ((u.w * u.q + u.x) * u.b + u.w * (u.r - 1 + 1) : ℕ) = u.w * u.a + u.x * u.b rw [← ha, hr] ring /-- We can now define the full reduction function, which applies step as long as possible, and then applies finish. Note that the "have" statement puts a fact in the local context, and the equation compiler uses this fact to help construct the full definition in terms of well-founded recursion. The same fact needs to be introduced in all the inductive proofs of properties given below. -/ def reduce (u : XgcdType) : XgcdType := dite (u.r = 0) (fun _ => u.finish) fun _h => flip (reduce u.step) decreasing_by apply u.step_wf _h theorem reduce_a {u : XgcdType} (h : u.r = 0) : u.reduce = u.finish := by rw [reduce] exact if_pos h theorem reduce_b {u : XgcdType} (h : u.r ≠ 0) : u.reduce = u.step.reduce.flip := by rw [reduce] exact if_neg h theorem reduce_isReduced : ∀ u : XgcdType, u.reduce.IsReduced \| u => dite (u.r = 0) (fun h => by rw [reduce_a h] exact u.finish_isReduced) fun h => by have : SizeOf.sizeOf u.step < SizeOf.sizeOf u := u.step_wf h rw [reduce_b h, flip_isReduced] apply reduce_isReduced theorem reduce_isReduced' (u : XgcdType) : u.reduce.IsReduced' := (isReduced_iff _).mp u.reduce_isReduced theorem reduce_isSpecial : ∀ u : XgcdType, u.IsSpecial → u.reduce.IsSpecial \| u => dite (u.r = 0) (fun h hs => by rw [reduce_a h] exact u.finish_isSpecial hs) fun h hs => by have : SizeOf.sizeOf u.step < SizeOf.sizeOf u := u.step_wf h rw [reduce_b h] exact (flip_isSpecial _).mpr (reduce_isSpecial _ (u.step_isSpecial hs)) theorem reduce_isSpecial' (u : XgcdType) (hs : u.IsSpecial) : u.reduce.IsSpecial' := (isSpecial_iff _).mp (u.reduce_isSpecial hs) theorem reduce_v : ∀ u : XgcdType, u.reduce.v = u.v \| u => dite (u.r = 0) (fun h => by rw [reduce_a h, finish_v u h]) fun h => by have : SizeOf.sizeOf u.step < SizeOf.sizeOf u := u.step_wf h rw [reduce_b h, flip_v, reduce_v (step u), step_v u h, Prod.swap_swap] end XgcdType section gcd variable (a b : ℕ+) /-- Extended Euclidean algorithm -/ def xgcd : XgcdType := (XgcdType.start a b).reduce /-- `gcdD a b = gcd a b` -/ def gcdD : ℕ+ := (xgcd a b).a /-- Final value of `w` -/ def gcdW : ℕ+ := (xgcd a b).w /-- Final value of `x` -/ def gcdX : ℕ := (xgcd a b).x /-- Final value of `y` -/ def gcdY : ℕ := (xgcd a b).y /-- Final value of `z` -/ def gcdZ : ℕ+ := (xgcd a b).z /-- Final value of `a / d` -/ def gcdA' : ℕ+ := succPNat ((xgcd a b).wp + (xgcd a b).x) /-- Final value of `b / d` -/ def gcdB' : ℕ+ := succPNat ((xgcd a b).y + (xgcd a b).zp) theorem gcdA'_coe : (gcdA' a b : ℕ) = gcdW a b + gcdX a b := by dsimp [gcdA', gcdX, gcdW, XgcdType.w] rw [add_right_comm] theorem gcdB'_coe : (gcdB' a b : ℕ) = gcdY a b + gcdZ a b := by dsimp [gcdB', gcdY, gcdZ, XgcdType.z] rw [add_assoc] theorem gcd_props : let d := gcdD a b let w := gcdW a b let x := gcdX a b let y := gcdY a b let z := gcdZ a b let a' := gcdA' a b let b' := gcdB' a b w * z = succPNat (x * y) ∧ a = a' * d ∧ b = b' * d ∧ z * a' = succPNat (x * b') ∧ w * b' = succPNat (y * a') ∧ (z * a : ℕ) = x * b + d ∧ (w * b : ℕ) = y * a + d := by intros d w x y z a' b' let u := XgcdType.start a b let ur := u.reduce have _ : d = ur.a := rfl have hb : d = ur.b := u.reduce_isReduced' have ha' : (a' : ℕ) = w + x := gcdA'_coe a b have hb' : (b' : ℕ) = y + z := gcdB'_coe a b have hdet : w * z = succPNat (x * y) := u.reduce_isSpecial' rfl constructor · exact hdet have hdet' : (w * z : ℕ) = x * y + 1 := by rw [← mul_coe, hdet, succPNat_coe] have _ : u.v = ⟨a, b⟩ := XgcdType.start_v a b let hv : Prod.mk (w * d + x * ur.b : ℕ) (y * d + z * ur.b : ℕ) = ⟨a, b⟩ := u.reduce_v.trans (XgcdType.start_v a b) rw [← hb, ← add_mul, ← add_mul, ← ha', ← hb'] at hv have ha'' : (a : ℕ) = a' * d := (congr_arg Prod.fst hv).symm have hb'' : (b : ℕ) = b' * d := (congr_arg Prod.snd hv).symm constructor · exact eq ha'' constructor · exact eq hb'' have hza' : (z * a' : ℕ) = x * b' + 1 := by rw [ha', hb', mul_add, mul_add, mul_comm (z : ℕ), hdet'] ring have hwb' : (w * b' : ℕ) = y * a' + 1 := by rw [ha', hb', mul_add, mul_add, hdet'] ring constructor · apply eq rw [succPNat_coe, Nat.succ_eq_add_one, mul_coe, hza'] constructor · apply eq rw [succPNat_coe, Nat.succ_eq_add_one, mul_coe, hwb'] rw [ha'', hb''] repeat rw [← @mul_assoc] rw [hza', hwb'] constructor <;> ring theorem gcd_eq : gcdD a b = gcd a b := by rcases gcd_props a b with ⟨_, h₁, h₂, _, _, h₅, _⟩ apply dvd_antisymm · apply dvd_gcd · exact Dvd.intro (gcdA' a b) (h₁.trans (mul_comm _ _)).symm · exact Dvd.intro (gcdB' a b) (h₂.trans (mul_comm _ _)).symm · have h₇ : (gcd a b : ℕ) ∣ gcdZ a b * a := (Nat.gcd_dvd_left a b).trans (dvd_mul_left _ _)	have h₈ : (gcd a b : ℕ) ∣ gcdX a b * b := (Nat.gcd_dvd_right a b).trans (dvd_mul_left _ _) rw [h₅] at h₇ rw [dvd_iff]	Mathlib/Data/PNat/Xgcd.lean	448	450
/- 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	1,149	1,152
/- Copyright (c) 2019 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel -/ import Mathlib.Data.Set.Piecewise import Mathlib.Logic.Equiv.Defs import Mathlib.Tactic.Core import Mathlib.Tactic.Attr.Core /-! # Partial equivalences This files defines equivalences between subsets of given types. An element `e` of `PartialEquiv α β` is made of two maps `e.toFun` and `e.invFun` respectively from α to β and from β to α (just like equivs), which are inverse to each other on the subsets `e.source` and `e.target` of respectively α and β. They are designed in particular to define charts on manifolds. The main functionality is `e.trans f`, which composes the two partial equivalences by restricting the source and target to the maximal set where the composition makes sense. As for equivs, we register a coercion to functions and use it in our simp normal form: we write `e x` and `e.symm y` instead of `e.toFun x` and `e.invFun y`. ## Main definitions * `Equiv.toPartialEquiv`: associating a partial equiv to an equiv, with source = target = univ * `PartialEquiv.symm`: the inverse of a partial equivalence * `PartialEquiv.trans`: the composition of two partial equivalences * `PartialEquiv.refl`: the identity partial equivalence * `PartialEquiv.ofSet`: the identity on a set `s` * `EqOnSource`: equivalence relation describing the "right" notion of equality for partial equivalences (see below in implementation notes) ## Implementation notes There are at least three possible implementations of partial equivalences: * equivs on subtypes * pairs of functions taking values in `Option α` and `Option β`, equal to none where the partial equivalence is not defined * pairs of functions defined everywhere, keeping the source and target as additional data Each of these implementations has pros and cons. * When dealing with subtypes, one still need to define additional API for composition and restriction of domains. Checking that one always belongs to the right subtype makes things very tedious, and leads quickly to DTT hell (as the subtype `u ∩ v` is not the "same" as `v ∩ u`, for instance). * With option-valued functions, the composition is very neat (it is just the usual composition, and the domain is restricted automatically). These are implemented in `PEquiv.lean`. For manifolds, where one wants to discuss thoroughly the smoothness of the maps, this creates however a lot of overhead as one would need to extend all classes of smoothness to option-valued maps. * The `PartialEquiv` version as explained above is easier to use for manifolds. The drawback is that there is extra useless data (the values of `toFun` and `invFun` outside of `source` and `target`). In particular, the equality notion between partial equivs is not "the right one", i.e., coinciding source and target and equality there. Moreover, there are no partial equivs in this sense between an empty type and a nonempty type. Since empty types are not that useful, and since one almost never needs to talk about equal partial equivs, this is not an issue in practice. Still, we introduce an equivalence relation `EqOnSource` that captures this right notion of equality, and show that many properties are invariant under this equivalence relation. ### Local coding conventions If a lemma deals with the intersection of a set with either source or target of a `PartialEquiv`, then it should use `e.source ∩ s` or `e.target ∩ t`, not `s ∩ e.source` or `t ∩ e.target`. -/ open Lean Meta Elab Tactic /-! Implementation of the `mfld_set_tac` tactic for working with the domains of partially-defined functions (`PartialEquiv`, `PartialHomeomorph`, etc). This is in a separate file from `Mathlib.Logic.Equiv.MfldSimpsAttr` because attributes need a new file to become functional. -/ /-- Common `@[simps]` configuration options used for manifold-related declarations. -/ def mfld_cfg : Simps.Config where attrs := [`mfld_simps] fullyApplied := false namespace Tactic.MfldSetTac /-- A very basic tactic to show that sets showing up in manifolds coincide or are included in one another. -/ elab (name := mfldSetTac) "mfld_set_tac" : tactic => withMainContext do let g ← getMainGoal let goalTy := (← instantiateMVars (← g.getDecl).type).getAppFnArgs match goalTy with \| (``Eq, #[_ty, _e₁, _e₂]) => evalTactic (← `(tactic\| ( apply Set.ext; intro my_y constructor <;> · intro h_my_y try simp only [, mfld_simps] at h_my_y try simp only [, mfld_simps]))) \| (``Subset, #[_ty, _inst, _e₁, _e₂]) => evalTactic (← `(tactic\| ( intro my_y h_my_y try simp only [, mfld_simps] at h_my_y try simp only [, mfld_simps]))) \| _ => throwError "goal should be an equality or an inclusion" attribute [mfld_simps] and_true eq_self_iff_true Function.comp_apply end Tactic.MfldSetTac open Function Set variable {α : Type} {β : Type} {γ : Type} {δ : Type} /-- Local equivalence between subsets `source` and `target` of `α` and `β` respectively. The (global) maps `toFun : α → β` and `invFun : β → α` map `source` to `target` and conversely, and are inverse to each other there. The values of `toFun` outside of `source` and of `invFun` outside of `target` are irrelevant. -/ structure PartialEquiv (α : Type) (β : Type) where /-- The global function which has a partial inverse. Its value outside of the `source` subset is irrelevant. -/ toFun : α → β /-- The partial inverse to `toFun`. Its value outside of the `target` subset is irrelevant. -/ invFun : β → α /-- The domain of the partial equivalence. -/ source : Set α /-- The codomain of the partial equivalence. -/ target : Set β /-- The proposition that elements of `source` are mapped to elements of `target`. -/ map_source' : ∀ ⦃x⦄, x ∈ source → toFun x ∈ target /-- The proposition that elements of `target` are mapped to elements of `source`. -/ map_target' : ∀ ⦃x⦄, x ∈ target → invFun x ∈ source /-- The proposition that `invFun` is a left-inverse of `toFun` on `source`. -/ left_inv' : ∀ ⦃x⦄, x ∈ source → invFun (toFun x) = x /-- The proposition that `invFun` is a right-inverse of `toFun` on `target`. -/ right_inv' : ∀ ⦃x⦄, x ∈ target → toFun (invFun x) = x attribute [coe] PartialEquiv.toFun namespace PartialEquiv variable (e : PartialEquiv α β) (e' : PartialEquiv β γ) instance [Inhabited α] [Inhabited β] : Inhabited (PartialEquiv α β) := ⟨⟨const α default, const β default, ∅, ∅, mapsTo_empty _ _, mapsTo_empty _ _, eqOn_empty _ _, eqOn_empty _ _⟩⟩ /-- The inverse of a partial equivalence -/ @[symm] protected def symm : PartialEquiv β α where toFun := e.invFun invFun := e.toFun source := e.target target := e.source map_source' := e.map_target' map_target' := e.map_source' left_inv' := e.right_inv' right_inv' := e.left_inv' instance : CoeFun (PartialEquiv α β) fun _ => α → β := ⟨PartialEquiv.toFun⟩ /-- See Note [custom simps projection] -/ def Simps.symm_apply (e : PartialEquiv α β) : β → α := e.symm initialize_simps_projections PartialEquiv (toFun → apply, invFun → symm_apply) theorem coe_mk (f : α → β) (g s t ml mr il ir) : (PartialEquiv.mk f g s t ml mr il ir : α → β) = f := rfl @[simp, mfld_simps] theorem coe_symm_mk (f : α → β) (g s t ml mr il ir) : ((PartialEquiv.mk f g s t ml mr il ir).symm : β → α) = g := rfl @[simp, mfld_simps] theorem invFun_as_coe : e.invFun = e.symm := rfl @[simp, mfld_simps] theorem map_source {x : α} (h : x ∈ e.source) : e x ∈ e.target := e.map_source' h /-- Variant of `e.map_source` and `map_source'`, stated for images of subsets of `source`. -/ lemma map_source'' : e '' e.source ⊆ e.target := fun _ ⟨_, hx, hex⟩ ↦ mem_of_eq_of_mem (id hex.symm) (e.map_source' hx) @[simp, mfld_simps] theorem map_target {x : β} (h : x ∈ e.target) : e.symm x ∈ e.source := e.map_target' h @[simp, mfld_simps] theorem left_inv {x : α} (h : x ∈ e.source) : e.symm (e x) = x := e.left_inv' h @[simp, mfld_simps] theorem right_inv {x : β} (h : x ∈ e.target) : e (e.symm x) = x := e.right_inv' h theorem eq_symm_apply {x : α} {y : β} (hx : x ∈ e.source) (hy : y ∈ e.target) : x = e.symm y ↔ e x = y := ⟨fun h => by rw [← e.right_inv hy, h], fun h => by rw [← e.left_inv hx, h]⟩ protected theorem mapsTo : MapsTo e e.source e.target := fun _ => e.map_source theorem symm_mapsTo : MapsTo e.symm e.target e.source := e.symm.mapsTo protected theorem leftInvOn : LeftInvOn e.symm e e.source := fun _ => e.left_inv protected theorem rightInvOn : RightInvOn e.symm e e.target := fun _ => e.right_inv protected theorem invOn : InvOn e.symm e e.source e.target := ⟨e.leftInvOn, e.rightInvOn⟩ protected theorem injOn : InjOn e e.source := e.leftInvOn.injOn protected theorem bijOn : BijOn e e.source e.target := e.invOn.bijOn e.mapsTo e.symm_mapsTo protected theorem surjOn : SurjOn e e.source e.target := e.bijOn.surjOn /-- Interpret an `Equiv` as a `PartialEquiv` by restricting it to `s` in the domain and to `t` in the codomain. -/ @[simps -fullyApplied] def _root_.Equiv.toPartialEquivOfImageEq (e : α ≃ β) (s : Set α) (t : Set β) (h : e '' s = t) : PartialEquiv α β where toFun := e invFun := e.symm source := s target := t map_source' _ hx := h ▸ mem_image_of_mem _ hx map_target' x hx := by subst t rcases hx with ⟨x, hx, rfl⟩ rwa [e.symm_apply_apply] left_inv' x _ := e.symm_apply_apply x right_inv' x _ := e.apply_symm_apply x /-- Associate a `PartialEquiv` to an `Equiv`. -/ @[simps! (config := mfld_cfg)] def _root_.Equiv.toPartialEquiv (e : α ≃ β) : PartialEquiv α β := e.toPartialEquivOfImageEq univ univ <\| by rw [image_univ, e.surjective.range_eq] instance inhabitedOfEmpty [IsEmpty α] [IsEmpty β] : Inhabited (PartialEquiv α β) := ⟨((Equiv.equivEmpty α).trans (Equiv.equivEmpty β).symm).toPartialEquiv⟩ /-- Create a copy of a `PartialEquiv` providing better definitional equalities. -/ @[simps -fullyApplied] def copy (e : PartialEquiv α β) (f : α → β) (hf : ⇑e = f) (g : β → α) (hg : ⇑e.symm = g) (s : Set α) (hs : e.source = s) (t : Set β) (ht : e.target = t) : PartialEquiv α β where toFun := f invFun := g source := s target := t map_source' _ := ht ▸ hs ▸ hf ▸ e.map_source map_target' _ := hs ▸ ht ▸ hg ▸ e.map_target left_inv' _ := hs ▸ hf ▸ hg ▸ e.left_inv right_inv' _ := ht ▸ hf ▸ hg ▸ e.right_inv theorem copy_eq (e : PartialEquiv α β) (f : α → β) (hf : ⇑e = f) (g : β → α) (hg : ⇑e.symm = g) (s : Set α) (hs : e.source = s) (t : Set β) (ht : e.target = t) : e.copy f hf g hg s hs t ht = e := by substs f g s t cases e rfl /-- Associate to a `PartialEquiv` an `Equiv` between the source and the target. -/ protected def toEquiv : e.source ≃ e.target where toFun x := ⟨e x, e.map_source x.mem⟩ invFun y := ⟨e.symm y, e.map_target y.mem⟩ left_inv := fun ⟨_, hx⟩ => Subtype.eq <\| e.left_inv hx right_inv := fun ⟨_, hy⟩ => Subtype.eq <\| e.right_inv hy @[simp, mfld_simps] theorem symm_source : e.symm.source = e.target := rfl @[simp, mfld_simps] theorem symm_target : e.symm.target = e.source := rfl @[simp, mfld_simps] theorem symm_symm : e.symm.symm = e := rfl theorem symm_bijective : Function.Bijective (PartialEquiv.symm : PartialEquiv α β → PartialEquiv β α) := Function.bijective_iff_has_inverse.mpr ⟨_, symm_symm, symm_symm⟩ theorem image_source_eq_target : e '' e.source = e.target := e.bijOn.image_eq theorem forall_mem_target {p : β → Prop} : (∀ y ∈ e.target, p y) ↔ ∀ x ∈ e.source, p (e x) := by rw [← image_source_eq_target, forall_mem_image] theorem exists_mem_target {p : β → Prop} : (∃ y ∈ e.target, p y) ↔ ∃ x ∈ e.source, p (e x) := by rw [← image_source_eq_target, exists_mem_image] /-- We say that `t : Set β` is an image of `s : Set α` under a partial equivalence if any of the following equivalent conditions hold: * `e '' (e.source ∩ s) = e.target ∩ t`;	* `e.source ∩ e ⁻¹ t = e.source ∩ s`; * `∀ x ∈ e.source, e x ∈ t ↔ x ∈ s` (this one is used in the definition). -/ def IsImage (s : Set α) (t : Set β) : Prop := ∀ ⦃x⦄, x ∈ e.source → (e x ∈ t ↔ x ∈ s)	Mathlib/Logic/Equiv/PartialEquiv.lean	305	310
/- Copyright (c) 2020 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel, Floris van Doorn -/ import Mathlib.Geometry.Manifold.MFDeriv.Atlas import Mathlib.Geometry.Manifold.VectorBundle.Basic /-! # Unique derivative sets in manifolds In this file, we prove various properties of unique derivative sets in manifolds. * `image_denseRange`: suppose `f` is differentiable on `s` and its derivative at every point of `s` has dense range. If `s` has the unique differential property, then so does `f '' s`. * `uniqueMDiffOn_preimage`: the unique differential property is preserved by local diffeomorphisms * `uniqueDiffOn_target_inter`: the unique differential property is preserved by pullbacks of extended charts * `tangentBundle_proj_preimage`: if `s` has the unique differential property, its preimage under the tangent bundle projection also has -/ noncomputable section open scoped Manifold open Set /-! ### Unique derivative sets in manifolds -/ section UniqueMDiff variable {𝕜 : Type} [NontriviallyNormedField 𝕜] {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {H : Type} [TopologicalSpace H] {I : ModelWithCorners 𝕜 E H} {M : Type} [TopologicalSpace M] [ChartedSpace H M] {E' : Type} [NormedAddCommGroup E'] [NormedSpace 𝕜 E'] {H' : Type} [TopologicalSpace H'] {I' : ModelWithCorners 𝕜 E' H'} {M' : Type} [TopologicalSpace M'] [ChartedSpace H' M'] {M'' : Type} [TopologicalSpace M''] [ChartedSpace H' M''] {s : Set M} {x : M}	section /-- If `s` has the unique differential property at `x`, `f` is differentiable within `s` at x` and its derivative has dense range, then `f '' s` has the unique differential property at `f x`. -/ theorem UniqueMDiffWithinAt.image_denseRange (hs : UniqueMDiffWithinAt I s x) {f : M → M'} {f' : E →L[𝕜] E'} (hf : HasMFDerivWithinAt I I' f s x f') (hd : DenseRange f') : UniqueMDiffWithinAt I' (f '' s) (f x) := by /- Rewrite in coordinates, apply `HasFDerivWithinAt.uniqueDiffWithinAt`. -/ have := hs.inter' <\| hf.1 (extChartAt_source_mem_nhds (I := I') (f x)) refine (((hf.2.mono ?sub1).uniqueDiffWithinAt this hd).mono ?sub2).congr_pt ?pt case pt => simp only [mfld_simps]	Mathlib/Geometry/Manifold/MFDeriv/UniqueDifferential.lean	39	49
/- Copyright (c) 2020 Floris van Doorn. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Floris van Doorn -/ import Mathlib.MeasureTheory.Measure.Content import Mathlib.MeasureTheory.Group.Prod import Mathlib.Topology.Algebra.Group.Compact /-! # Haar measure In this file we prove the existence of Haar measure for a locally compact Hausdorff topological group. We follow the write-up by Jonathan Gleason, Existence and Uniqueness of Haar Measure. This is essentially the same argument as in https://en.wikipedia.org/wiki/Haar_measure#A_construction_using_compact_subsets. We construct the Haar measure first on compact sets. For this we define `(K : U)` as the (smallest) number of left-translates of `U` that are needed to cover `K` (`index` in the formalization). Then we define a function `h` on compact sets as `lim_U (K : U) / (K₀ : U)`, where `U` becomes a smaller and smaller open neighborhood of `1`, and `K₀` is a fixed compact set with nonempty interior. This function is `chaar` in the formalization, and we define the limit formally using Tychonoff's theorem. This function `h` forms a content, which we can extend to an outer measure and then a measure (`haarMeasure`). We normalize the Haar measure so that the measure of `K₀` is `1`. Note that `μ` need not coincide with `h` on compact sets, according to [halmos1950measure, ch. X, §53 p.233]. However, we know that `h(K)` lies between `μ(Kᵒ)` and `μ(K)`, where `ᵒ` denotes the interior. We also give a form of uniqueness of Haar measure, for σ-finite measures on second-countable locally compact groups. For more involved statements not assuming second-countability, see the file `Mathlib/MeasureTheory/Measure/Haar/Unique.lean`. ## Main Declarations * `haarMeasure`: the Haar measure on a locally compact Hausdorff group. This is a left invariant regular measure. It takes as argument a compact set of the group (with non-empty interior), and is normalized so that the measure of the given set is 1. * `haarMeasure_self`: the Haar measure is normalized. * `isMulLeftInvariant_haarMeasure`: the Haar measure is left invariant. * `regular_haarMeasure`: the Haar measure is a regular measure. * `isHaarMeasure_haarMeasure`: the Haar measure satisfies the `IsHaarMeasure` typeclass, i.e., it is invariant and gives finite mass to compact sets and positive mass to nonempty open sets. * `haar` : some choice of a Haar measure, on a locally compact Hausdorff group, constructed as `haarMeasure K` where `K` is some arbitrary choice of a compact set with nonempty interior. * `haarMeasure_unique`: Every σ-finite left invariant measure on a second-countable locally compact Hausdorff group is a scalar multiple of the Haar measure. ## References * Paul Halmos (1950), Measure Theory, §53 * Jonathan Gleason, Existence and Uniqueness of Haar Measure - Note: step 9, page 8 contains a mistake: the last defined `μ` does not extend the `μ` on compact sets, see Halmos (1950) p. 233, bottom of the page. This makes some other steps (like step 11) invalid. * https://en.wikipedia.org/wiki/Haar_measure -/ noncomputable section open Set Inv Function TopologicalSpace MeasurableSpace open scoped NNReal ENNReal Pointwise Topology namespace MeasureTheory namespace Measure section Group variable {G : Type} [Group G] /-! We put the internal functions in the construction of the Haar measure in a namespace, so that the chosen names don't clash with other declarations. We first define a couple of the functions before proving the properties (that require that `G` is a topological group). -/ namespace haar /-- The index or Haar covering number or ratio of `K` w.r.t. `V`, denoted `(K : V)`: it is the smallest number of (left) translates of `V` that is necessary to cover `K`. It is defined to be 0 if no finite number of translates cover `K`. -/ @[to_additive addIndex "additive version of `MeasureTheory.Measure.haar.index`"] noncomputable def index (K V : Set G) : ℕ := sInf <\| Finset.card '' { t : Finset G \| K ⊆ ⋃ g ∈ t, (fun h => g h) ⁻¹' V } @[to_additive addIndex_empty] theorem index_empty {V : Set G} : index ∅ V = 0 := by simp [index] variable [TopologicalSpace G] /-- `prehaar K₀ U K` is a weighted version of the index, defined as `(K : U)/(K₀ : U)`. In the applications `K₀` is compact with non-empty interior, `U` is open containing `1`, and `K` is any compact set. The argument `K` is a (bundled) compact set, so that we can consider `prehaar K₀ U` as an element of `haarProduct` (below). -/ @[to_additive "additive version of `MeasureTheory.Measure.haar.prehaar`"] noncomputable def prehaar (K₀ U : Set G) (K : Compacts G) : ℝ := (index (K : Set G) U : ℝ) / index K₀ U @[to_additive] theorem prehaar_empty (K₀ : PositiveCompacts G) {U : Set G} : prehaar (K₀ : Set G) U ⊥ = 0 := by rw [prehaar, Compacts.coe_bot, index_empty, Nat.cast_zero, zero_div] @[to_additive] theorem prehaar_nonneg (K₀ : PositiveCompacts G) {U : Set G} (K : Compacts G) : 0 ≤ prehaar (K₀ : Set G) U K := by apply div_nonneg <;> norm_cast <;> apply zero_le /-- `haarProduct K₀` is the product of intervals `[0, (K : K₀)]`, for all compact sets `K`. For all `U`, we can show that `prehaar K₀ U ∈ haarProduct K₀`. -/ @[to_additive "additive version of `MeasureTheory.Measure.haar.haarProduct`"] def haarProduct (K₀ : Set G) : Set (Compacts G → ℝ) := pi univ fun K => Icc 0 <\| index (K : Set G) K₀ @[to_additive (attr := simp)] theorem mem_prehaar_empty {K₀ : Set G} {f : Compacts G → ℝ} : f ∈ haarProduct K₀ ↔ ∀ K : Compacts G, f K ∈ Icc (0 : ℝ) (index (K : Set G) K₀) := by simp only [haarProduct, Set.pi, forall_prop_of_true, mem_univ, mem_setOf_eq] /-- The closure of the collection of elements of the form `prehaar K₀ U`, for `U` open neighbourhoods of `1`, contained in `V`. The closure is taken in the space `compacts G → ℝ`, with the topology of pointwise convergence. We show that the intersection of all these sets is nonempty, and the Haar measure on compact sets is defined to be an element in the closure of this intersection. -/ @[to_additive "additive version of `MeasureTheory.Measure.haar.clPrehaar`"] def clPrehaar (K₀ : Set G) (V : OpenNhdsOf (1 : G)) : Set (Compacts G → ℝ) := closure <\| prehaar K₀ '' { U : Set G \| U ⊆ V.1 ∧ IsOpen U ∧ (1 : G) ∈ U } variable [IsTopologicalGroup G] /-! ### Lemmas about `index` -/ /-- If `K` is compact and `V` has nonempty interior, then the index `(K : V)` is well-defined, there is a finite set `t` satisfying the desired properties. -/ @[to_additive addIndex_defined "If `K` is compact and `V` has nonempty interior, then the index `(K : V)` is well-defined, there is a finite set `t` satisfying the desired properties."] theorem index_defined {K V : Set G} (hK : IsCompact K) (hV : (interior V).Nonempty) : ∃ n : ℕ, n ∈ Finset.card '' { t : Finset G \| K ⊆ ⋃ g ∈ t, (fun h => g * h) ⁻¹' V } := by rcases compact_covered_by_mul_left_translates hK hV with ⟨t, ht⟩; exact ⟨t.card, t, ht, rfl⟩ @[to_additive addIndex_elim] theorem index_elim {K V : Set G} (hK : IsCompact K) (hV : (interior V).Nonempty) : ∃ t : Finset G, (K ⊆ ⋃ g ∈ t, (fun h => g * h) ⁻¹' V) ∧ Finset.card t = index K V := by have := Nat.sInf_mem (index_defined hK hV); rwa [mem_image] at this @[to_additive le_addIndex_mul] theorem le_index_mul (K₀ : PositiveCompacts G) (K : Compacts G) {V : Set G} (hV : (interior V).Nonempty) : index (K : Set G) V ≤ index (K : Set G) K₀ * index (K₀ : Set G) V := by classical obtain ⟨s, h1s, h2s⟩ := index_elim K.isCompact K₀.interior_nonempty obtain ⟨t, h1t, h2t⟩ := index_elim K₀.isCompact hV rw [← h2s, ← h2t, mul_comm] refine le_trans ?_ Finset.card_mul_le apply Nat.sInf_le; refine ⟨_, ?_, rfl⟩; rw [mem_setOf_eq]; refine Subset.trans h1s ?_ apply iUnion₂_subset; intro g₁ hg₁; rw [preimage_subset_iff]; intro g₂ hg₂ have := h1t hg₂ rcases this with ⟨_, ⟨g₃, rfl⟩, A, ⟨hg₃, rfl⟩, h2V⟩; rw [mem_preimage, ← mul_assoc] at h2V exact mem_biUnion (Finset.mul_mem_mul hg₃ hg₁) h2V @[to_additive addIndex_pos] theorem index_pos (K : PositiveCompacts G) {V : Set G} (hV : (interior V).Nonempty) : 0 < index (K : Set G) V := by classical rw [index, Nat.sInf_def, Nat.find_pos, mem_image] · rintro ⟨t, h1t, h2t⟩; rw [Finset.card_eq_zero] at h2t; subst h2t obtain ⟨g, hg⟩ := K.interior_nonempty	show g ∈ (∅ : Set G) convert h1t (interior_subset hg); symm simp only [Finset.not_mem_empty, iUnion_of_empty, iUnion_empty]	Mathlib/MeasureTheory/Measure/Haar/Basic.lean	178	180
/- Copyright (c) 2015 Microsoft Corporation. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Leonardo de Moura -/ import Mathlib.Data.Stream.Defs import Mathlib.Logic.Function.Basic import Mathlib.Data.List.Defs import Mathlib.Data.Nat.Basic import Mathlib.Tactic.Common /-! # Streams a.k.a. infinite lists a.k.a. infinite sequences -/ open Nat Function Option namespace Stream' universe u v w variable {α : Type u} {β : Type v} {δ : Type w} variable (m n : ℕ) (x y : List α) (a b : Stream' α) instance [Inhabited α] : Inhabited (Stream' α) := ⟨Stream'.const default⟩ @[simp] protected theorem eta (s : Stream' α) : head s :: tail s = s := funext fun i => by cases i <;> rfl /-- Alias for `Stream'.eta` to match `List` API. -/ alias cons_head_tail := Stream'.eta @[ext] protected theorem ext {s₁ s₂ : Stream' α} : (∀ n, get s₁ n = get s₂ n) → s₁ = s₂ := fun h => funext h @[simp] theorem get_zero_cons (a : α) (s : Stream' α) : get (a::s) 0 = a := rfl @[simp] theorem head_cons (a : α) (s : Stream' α) : head (a::s) = a := rfl @[simp] theorem tail_cons (a : α) (s : Stream' α) : tail (a::s) = s := rfl @[simp] theorem get_drop (n m : ℕ) (s : Stream' α) : get (drop m s) n = get s (m + n) := by rw [Nat.add_comm] rfl theorem tail_eq_drop (s : Stream' α) : tail s = drop 1 s := rfl @[simp] theorem drop_drop (n m : ℕ) (s : Stream' α) : drop n (drop m s) = drop (m + n) s := by ext; simp [Nat.add_assoc] @[simp] theorem get_tail {n : ℕ} {s : Stream' α} : s.tail.get n = s.get (n + 1) := rfl @[simp] theorem tail_drop' {i : ℕ} {s : Stream' α} : tail (drop i s) = s.drop (i + 1) := by ext; simp [Nat.add_comm, Nat.add_assoc, Nat.add_left_comm] @[simp] theorem drop_tail' {i : ℕ} {s : Stream' α} : drop i (tail s) = s.drop (i + 1) := rfl theorem tail_drop (n : ℕ) (s : Stream' α) : tail (drop n s) = drop n (tail s) := by simp theorem get_succ (n : ℕ) (s : Stream' α) : get s (succ n) = get (tail s) n := rfl @[simp] theorem get_succ_cons (n : ℕ) (s : Stream' α) (x : α) : get (x :: s) n.succ = get s n := rfl @[simp] lemma get_cons_append_zero {a : α} {x : List α} {s : Stream' α} : (a :: x ++ₛ s).get 0 = a := rfl @[simp] lemma append_eq_cons {a : α} {as : Stream' α} : [a] ++ₛ as = a :: as := by rfl @[simp] theorem drop_zero {s : Stream' α} : s.drop 0 = s := rfl theorem drop_succ (n : ℕ) (s : Stream' α) : drop (succ n) s = drop n (tail s) := rfl theorem head_drop (a : Stream' α) (n : ℕ) : (a.drop n).head = a.get n := by simp theorem cons_injective2 : Function.Injective2 (cons : α → Stream' α → Stream' α) := fun x y s t h => ⟨by rw [← get_zero_cons x s, h, get_zero_cons], Stream'.ext fun n => by rw [← get_succ_cons n _ x, h, get_succ_cons]⟩ theorem cons_injective_left (s : Stream' α) : Function.Injective fun x => cons x s := cons_injective2.left _ theorem cons_injective_right (x : α) : Function.Injective (cons x) := cons_injective2.right _ theorem all_def (p : α → Prop) (s : Stream' α) : All p s = ∀ n, p (get s n) := rfl theorem any_def (p : α → Prop) (s : Stream' α) : Any p s = ∃ n, p (get s n) := rfl @[simp] theorem mem_cons (a : α) (s : Stream' α) : a ∈ a::s := Exists.intro 0 rfl theorem mem_cons_of_mem {a : α} {s : Stream' α} (b : α) : a ∈ s → a ∈ b::s := fun ⟨n, h⟩ => Exists.intro (succ n) (by rw [get_succ, tail_cons, h]) theorem eq_or_mem_of_mem_cons {a b : α} {s : Stream' α} : (a ∈ b::s) → a = b ∨ a ∈ s := fun ⟨n, h⟩ => by rcases n with - \| n' · left exact h · right rw [get_succ, tail_cons] at h exact ⟨n', h⟩ theorem mem_of_get_eq {n : ℕ} {s : Stream' α} {a : α} : a = get s n → a ∈ s := fun h => Exists.intro n h section Map variable (f : α → β) theorem drop_map (n : ℕ) (s : Stream' α) : drop n (map f s) = map f (drop n s) := Stream'.ext fun _ => rfl @[simp] theorem get_map (n : ℕ) (s : Stream' α) : get (map f s) n = f (get s n) := rfl theorem tail_map (s : Stream' α) : tail (map f s) = map f (tail s) := rfl @[simp] theorem head_map (s : Stream' α) : head (map f s) = f (head s) := rfl theorem map_eq (s : Stream' α) : map f s = f (head s)::map f (tail s) := by rw [← Stream'.eta (map f s), tail_map, head_map] theorem map_cons (a : α) (s : Stream' α) : map f (a::s) = f a::map f s := by rw [← Stream'.eta (map f (a::s)), map_eq]; rfl @[simp] theorem map_id (s : Stream' α) : map id s = s := rfl @[simp] theorem map_map (g : β → δ) (f : α → β) (s : Stream' α) : map g (map f s) = map (g ∘ f) s := rfl @[simp] theorem map_tail (s : Stream' α) : map f (tail s) = tail (map f s) := rfl theorem mem_map {a : α} {s : Stream' α} : a ∈ s → f a ∈ map f s := fun ⟨n, h⟩ => Exists.intro n (by rw [get_map, h]) theorem exists_of_mem_map {f} {b : β} {s : Stream' α} : b ∈ map f s → ∃ a, a ∈ s ∧ f a = b := fun ⟨n, h⟩ => ⟨get s n, ⟨n, rfl⟩, h.symm⟩ end Map section Zip variable (f : α → β → δ) theorem drop_zip (n : ℕ) (s₁ : Stream' α) (s₂ : Stream' β) : drop n (zip f s₁ s₂) = zip f (drop n s₁) (drop n s₂) := Stream'.ext fun _ => rfl @[simp] theorem get_zip (n : ℕ) (s₁ : Stream' α) (s₂ : Stream' β) : get (zip f s₁ s₂) n = f (get s₁ n) (get s₂ n) := rfl theorem head_zip (s₁ : Stream' α) (s₂ : Stream' β) : head (zip f s₁ s₂) = f (head s₁) (head s₂) := rfl theorem tail_zip (s₁ : Stream' α) (s₂ : Stream' β) : tail (zip f s₁ s₂) = zip f (tail s₁) (tail s₂) := rfl theorem zip_eq (s₁ : Stream' α) (s₂ : Stream' β) : zip f s₁ s₂ = f (head s₁) (head s₂)::zip f (tail s₁) (tail s₂) := by rw [← Stream'.eta (zip f s₁ s₂)]; rfl @[simp] theorem get_enum (s : Stream' α) (n : ℕ) : get (enum s) n = (n, s.get n) := rfl theorem enum_eq_zip (s : Stream' α) : enum s = zip Prod.mk nats s := rfl end Zip @[simp] theorem mem_const (a : α) : a ∈ const a := Exists.intro 0 rfl theorem const_eq (a : α) : const a = a::const a := by apply Stream'.ext; intro n cases n <;> rfl @[simp] theorem tail_const (a : α) : tail (const a) = const a := suffices tail (a::const a) = const a by rwa [← const_eq] at this rfl @[simp] theorem map_const (f : α → β) (a : α) : map f (const a) = const (f a) := rfl @[simp] theorem get_const (n : ℕ) (a : α) : get (const a) n = a := rfl @[simp] theorem drop_const (n : ℕ) (a : α) : drop n (const a) = const a := Stream'.ext fun _ => rfl @[simp] theorem head_iterate (f : α → α) (a : α) : head (iterate f a) = a := rfl theorem get_succ_iterate' (n : ℕ) (f : α → α) (a : α) : get (iterate f a) (succ n) = f (get (iterate f a) n) := rfl theorem tail_iterate (f : α → α) (a : α) : tail (iterate f a) = iterate f (f a) := by ext n rw [get_tail] induction' n with n' ih · rfl · rw [get_succ_iterate', ih, get_succ_iterate'] theorem iterate_eq (f : α → α) (a : α) : iterate f a = a::iterate f (f a) := by rw [← Stream'.eta (iterate f a)] rw [tail_iterate]; rfl @[simp] theorem get_zero_iterate (f : α → α) (a : α) : get (iterate f a) 0 = a := rfl theorem get_succ_iterate (n : ℕ) (f : α → α) (a : α) : get (iterate f a) (succ n) = get (iterate f (f a)) n := by rw [get_succ, tail_iterate] section Bisim variable (R : Stream' α → Stream' α → Prop) /-- equivalence relation -/ local infixl:50 " ~ " => R /-- Streams `s₁` and `s₂` are defined to be bisimulations if their heads are equal and tails are bisimulations. -/ def IsBisimulation := ∀ ⦃s₁ s₂⦄, s₁ ~ s₂ → head s₁ = head s₂ ∧ tail s₁ ~ tail s₂ theorem get_of_bisim (bisim : IsBisimulation R) {s₁ s₂} : ∀ n, s₁ ~ s₂ → get s₁ n = get s₂ n ∧ drop (n + 1) s₁ ~ drop (n + 1) s₂ \| 0, h => bisim h \| n + 1, h => match bisim h with \| ⟨_, trel⟩ => get_of_bisim bisim n trel -- If two streams are bisimilar, then they are equal theorem eq_of_bisim (bisim : IsBisimulation R) {s₁ s₂} : s₁ ~ s₂ → s₁ = s₂ := fun r => Stream'.ext fun n => And.left (get_of_bisim R bisim n r) end Bisim theorem bisim_simple (s₁ s₂ : Stream' α) : head s₁ = head s₂ → s₁ = tail s₁ → s₂ = tail s₂ → s₁ = s₂ := fun hh ht₁ ht₂ => eq_of_bisim (fun s₁ s₂ => head s₁ = head s₂ ∧ s₁ = tail s₁ ∧ s₂ = tail s₂) (fun s₁ s₂ ⟨h₁, h₂, h₃⟩ => by constructor · exact h₁ rw [← h₂, ← h₃] (repeat' constructor) <;> assumption) (And.intro hh (And.intro ht₁ ht₂)) theorem coinduction {s₁ s₂ : Stream' α} : head s₁ = head s₂ → (∀ (β : Type u) (fr : Stream' α → β), fr s₁ = fr s₂ → fr (tail s₁) = fr (tail s₂)) → s₁ = s₂ := fun hh ht => eq_of_bisim (fun s₁ s₂ => head s₁ = head s₂ ∧ ∀ (β : Type u) (fr : Stream' α → β), fr s₁ = fr s₂ → fr (tail s₁) = fr (tail s₂)) (fun s₁ s₂ h => have h₁ : head s₁ = head s₂ := And.left h have h₂ : head (tail s₁) = head (tail s₂) := And.right h α (@head α) h₁ have h₃ : ∀ (β : Type u) (fr : Stream' α → β), fr (tail s₁) = fr (tail s₂) → fr (tail (tail s₁)) = fr (tail (tail s₂)) := fun β fr => And.right h β fun s => fr (tail s) And.intro h₁ (And.intro h₂ h₃)) (And.intro hh ht) @[simp] theorem iterate_id (a : α) : iterate id a = const a := coinduction rfl fun β fr ch => by rw [tail_iterate, tail_const]; exact ch theorem map_iterate (f : α → α) (a : α) : iterate f (f a) = map f (iterate f a) := by funext n induction' n with n' ih · rfl · unfold map iterate get rw [map, get] at ih rw [iterate] exact congrArg f ih section Corec theorem corec_def (f : α → β) (g : α → α) (a : α) : corec f g a = map f (iterate g a) := rfl theorem corec_eq (f : α → β) (g : α → α) (a : α) : corec f g a = f a :: corec f g (g a) := by rw [corec_def, map_eq, head_iterate, tail_iterate]; rfl theorem corec_id_id_eq_const (a : α) : corec id id a = const a := by rw [corec_def, map_id, iterate_id] theorem corec_id_f_eq_iterate (f : α → α) (a : α) : corec id f a = iterate f a := rfl end Corec section Corec' theorem corec'_eq (f : α → β × α) (a : α) : corec' f a = (f a).1 :: corec' f (f a).2 := corec_eq _ _ _ end Corec' theorem unfolds_eq (g : α → β) (f : α → α) (a : α) : unfolds g f a = g a :: unfolds g f (f a) := by unfold unfolds; rw [corec_eq] theorem get_unfolds_head_tail : ∀ (n : ℕ) (s : Stream' α), get (unfolds head tail s) n = get s n := by intro n; induction' n with n' ih · intro s rfl · intro s rw [get_succ, get_succ, unfolds_eq, tail_cons, ih] theorem unfolds_head_eq : ∀ s : Stream' α, unfolds head tail s = s := fun s => Stream'.ext fun n => get_unfolds_head_tail n s theorem interleave_eq (s₁ s₂ : Stream' α) : s₁ ⋈ s₂ = head s₁::head s₂::(tail s₁ ⋈ tail s₂) := by let t := tail s₁ ⋈ tail s₂ show s₁ ⋈ s₂ = head s₁::head s₂::t unfold interleave; unfold corecOn; rw [corec_eq]; dsimp; rw [corec_eq]; rfl theorem tail_interleave (s₁ s₂ : Stream' α) : tail (s₁ ⋈ s₂) = s₂ ⋈ tail s₁ := by unfold interleave corecOn; rw [corec_eq]; rfl theorem interleave_tail_tail (s₁ s₂ : Stream' α) : tail s₁ ⋈ tail s₂ = tail (tail (s₁ ⋈ s₂)) := by rw [interleave_eq s₁ s₂]; rfl theorem get_interleave_left : ∀ (n : ℕ) (s₁ s₂ : Stream' α), get (s₁ ⋈ s₂) (2 * n) = get s₁ n \| 0, _, _ => rfl \| n + 1, s₁, s₂ => by change get (s₁ ⋈ s₂) (succ (succ (2 * n))) = get s₁ (succ n) rw [get_succ, get_succ, interleave_eq, tail_cons, tail_cons] rw [get_interleave_left n (tail s₁) (tail s₂)] rfl theorem get_interleave_right : ∀ (n : ℕ) (s₁ s₂ : Stream' α), get (s₁ ⋈ s₂) (2 * n + 1) = get s₂ n \| 0, _, _ => rfl \| n + 1, s₁, s₂ => by change get (s₁ ⋈ s₂) (succ (succ (2 * n + 1))) = get s₂ (succ n) rw [get_succ, get_succ, interleave_eq, tail_cons, tail_cons, get_interleave_right n (tail s₁) (tail s₂)] rfl theorem mem_interleave_left {a : α} {s₁ : Stream' α} (s₂ : Stream' α) : a ∈ s₁ → a ∈ s₁ ⋈ s₂ := fun ⟨n, h⟩ => Exists.intro (2 * n) (by rw [h, get_interleave_left]) theorem mem_interleave_right {a : α} {s₁ : Stream' α} (s₂ : Stream' α) : a ∈ s₂ → a ∈ s₁ ⋈ s₂ := fun ⟨n, h⟩ => Exists.intro (2 * n + 1) (by rw [h, get_interleave_right]) theorem odd_eq (s : Stream' α) : odd s = even (tail s) := rfl @[simp] theorem head_even (s : Stream' α) : head (even s) = head s := rfl theorem tail_even (s : Stream' α) : tail (even s) = even (tail (tail s)) := by unfold even rw [corec_eq] rfl theorem even_cons_cons (a₁ a₂ : α) (s : Stream' α) : even (a₁::a₂::s) = a₁::even s := by unfold even rw [corec_eq]; rfl theorem even_tail (s : Stream' α) : even (tail s) = odd s := rfl theorem even_interleave (s₁ s₂ : Stream' α) : even (s₁ ⋈ s₂) = s₁ := eq_of_bisim (fun s₁' s₁ => ∃ s₂, s₁' = even (s₁ ⋈ s₂)) (fun s₁' s₁ ⟨s₂, h₁⟩ => by rw [h₁] constructor · rfl · exact ⟨tail s₂, by rw [interleave_eq, even_cons_cons, tail_cons]⟩) (Exists.intro s₂ rfl) theorem interleave_even_odd (s₁ : Stream' α) : even s₁ ⋈ odd s₁ = s₁ := eq_of_bisim (fun s' s => s' = even s ⋈ odd s) (fun s' s (h : s' = even s ⋈ odd s) => by rw [h]; constructor · rfl · simp [odd_eq, odd_eq, tail_interleave, tail_even]) rfl theorem get_even : ∀ (n : ℕ) (s : Stream' α), get (even s) n = get s (2 * n) \| 0, _ => rfl \| succ n, s => by change get (even s) (succ n) = get s (succ (succ (2 * n))) rw [get_succ, get_succ, tail_even, get_even n]; rfl theorem get_odd : ∀ (n : ℕ) (s : Stream' α), get (odd s) n = get s (2 * n + 1) := fun n s => by rw [odd_eq, get_even]; rfl theorem mem_of_mem_even (a : α) (s : Stream' α) : a ∈ even s → a ∈ s := fun ⟨n, h⟩ => Exists.intro (2 * n) (by rw [h, get_even]) theorem mem_of_mem_odd (a : α) (s : Stream' α) : a ∈ odd s → a ∈ s := fun ⟨n, h⟩ => Exists.intro (2 * n + 1) (by rw [h, get_odd]) @[simp] theorem nil_append_stream (s : Stream' α) : appendStream' [] s = s := rfl theorem cons_append_stream (a : α) (l : List α) (s : Stream' α) : appendStream' (a::l) s = a::appendStream' l s := rfl @[simp] theorem append_append_stream : ∀ (l₁ l₂ : List α) (s : Stream' α), l₁ ++ l₂ ++ₛ s = l₁ ++ₛ (l₂ ++ₛ s) \| [], _, _ => rfl \| List.cons a l₁, l₂, s => by rw [List.cons_append, cons_append_stream, cons_append_stream, append_append_stream l₁] lemma get_append_left (h : n < x.length) : (x ++ₛ a).get n = x[n] := by induction' x with b x ih generalizing n · simp at h · rcases n with (_ \| n) · simp · simp [ih n (by simpa using h), cons_append_stream] @[simp] lemma get_append_right : (x ++ₛ a).get (x.length + n) = a.get n := by induction' x <;> simp [Nat.succ_add, , cons_append_stream] @[simp] lemma get_append_length : (x ++ₛ a).get x.length = a.get 0 := get_append_right 0 x a lemma append_right_injective (h : x ++ₛ a = x ++ₛ b) : a = b := by ext n; replace h := congr_arg (fun a ↦ a.get (x.length + n)) h; simpa using h @[simp] lemma append_right_inj : x ++ₛ a = x ++ₛ b ↔ a = b := ⟨append_right_injective x a b, by simp +contextual⟩ lemma append_left_injective (h : x ++ₛ a = y ++ₛ b) (hl : x.length = y.length) : x = y := by apply List.ext_getElem hl intros rw [← get_append_left, ← get_append_left, h] theorem map_append_stream (f : α → β) : ∀ (l : List α) (s : Stream' α), map f (l ++ₛ s) = List.map f l ++ₛ map f s \| [], _ => rfl \| List.cons a l, s => by rw [cons_append_stream, List.map_cons, map_cons, cons_append_stream, map_append_stream f l] theorem drop_append_stream : ∀ (l : List α) (s : Stream' α), drop l.length (l ++ₛ s) = s \| [], s => by rfl \| List.cons a l, s => by rw [List.length_cons, drop_succ, cons_append_stream, tail_cons, drop_append_stream l s] theorem append_stream_head_tail (s : Stream' α) : [head s] ++ₛ tail s = s := by simp theorem mem_append_stream_right : ∀ {a : α} (l : List α) {s : Stream' α}, a ∈ s → a ∈ l ++ₛ s \| _, [], _, h => h \| a, List.cons _ l, s, h => have ih : a ∈ l ++ₛ s := mem_append_stream_right l h mem_cons_of_mem _ ih theorem mem_append_stream_left : ∀ {a : α} {l : List α} (s : Stream' α), a ∈ l → a ∈ l ++ₛ s \| _, [], _, h => absurd h List.not_mem_nil \| a, List.cons b l, s, h => Or.elim (List.eq_or_mem_of_mem_cons h) (fun aeqb : a = b => Exists.intro 0 aeqb) fun ainl : a ∈ l => mem_cons_of_mem b (mem_append_stream_left s ainl) @[simp] theorem take_zero (s : Stream' α) : take 0 s = [] := rfl -- This lemma used to be simp, but we removed it from the simp set because: -- 1) It duplicates the (often large) `s` term, resulting in large tactic states. -- 2) It conflicts with the very useful `dropLast_take` lemma below (causing nonconfluence). theorem take_succ (n : ℕ) (s : Stream' α) : take (succ n) s = head s::take n (tail s) := rfl @[simp] theorem take_succ_cons {a : α} (n : ℕ) (s : Stream' α) : take (n+1) (a::s) = a :: take n s := rfl theorem take_succ' {s : Stream' α} : ∀ n, s.take (n+1) = s.take n ++ [s.get n] \| 0 => rfl \| n+1 => by rw [take_succ, take_succ' n, ← List.cons_append, ← take_succ, get_tail] @[simp] theorem length_take (n : ℕ) (s : Stream' α) : (take n s).length = n := by induction n generalizing s <;> simp [, take_succ] @[simp] theorem take_take {s : Stream' α} : ∀ {m n}, (s.take n).take m = s.take (min n m) \| 0, n => by rw [Nat.min_zero, List.take_zero, take_zero] \| m, 0 => by rw [Nat.zero_min, take_zero, List.take_nil] \| m+1, n+1 => by rw [take_succ, List.take_succ_cons, Nat.succ_min_succ, take_succ, take_take] @[simp] theorem concat_take_get {n : ℕ} {s : Stream' α} : s.take n ++ [s.get n] = s.take (n + 1) := (take_succ' n).symm theorem getElem?_take {s : Stream' α} : ∀ {k n}, k < n → (s.take n)[k]? = s.get k \| 0, _+1, _ => by simp only [length_take, zero_lt_succ, List.getElem?_eq_getElem]; rfl \| k+1, n+1, h => by rw [take_succ, List.getElem?_cons_succ, getElem?_take (Nat.lt_of_succ_lt_succ h), get_succ] @[deprecated (since := "2025-02-14")] alias get?_take := getElem?_take theorem getElem?_take_succ (n : ℕ) (s : Stream' α) : (take (succ n) s)[n]? = some (get s n) := getElem?_take (Nat.lt_succ_self n) @[deprecated (since := "2025-02-14")] alias get?_take_succ := getElem?_take_succ @[simp] theorem dropLast_take {n : ℕ} {xs : Stream' α} : (Stream'.take n xs).dropLast = Stream'.take (n-1) xs := by cases n with \| zero => simp \| succ n => rw [take_succ', List.dropLast_concat, Nat.add_one_sub_one] @[simp] theorem append_take_drop : ∀ (n : ℕ) (s : Stream' α), appendStream' (take n s) (drop n s) = s := by intro n induction' n with n' ih · intro s rfl · intro s rw [take_succ, drop_succ, cons_append_stream, ih (tail s), Stream'.eta] lemma append_take : x ++ (a.take n) = (x ++ₛ a).take (x.length + n) := by induction' x <;> simp [take, Nat.add_comm, cons_append_stream, *] @[simp] lemma take_get (h : m < (a.take n).length) : (a.take n)[m] = a.get m := by nth_rw 2 [← append_take_drop n a]; rw [get_append_left] theorem take_append_of_le_length (h : n ≤ x.length) : (x ++ₛ a).take n = x.take n := by apply List.ext_getElem (by simp [h]) intro _ _ _; rw [List.getElem_take, take_get, get_append_left] lemma take_add : a.take (m + n) = a.take m ++ (a.drop m).take n := by apply append_left_injective _ _ (a.drop (m + n)) ((a.drop m).drop n) <;> simp [- drop_drop] @[gcongr] lemma take_prefix_take_left (h : m ≤ n) : a.take m <+: a.take n := by rw [(by simp [h] : a.take m = (a.take n).take m)] apply List.take_prefix @[simp] lemma take_prefix : a.take m <+: a.take n ↔ m ≤ n := ⟨fun h ↦ by simpa using h.length_le, take_prefix_take_left m n a⟩ lemma map_take (f : α → β) : (a.take n).map f = (a.map f).take n := by apply List.ext_getElem <;> simp lemma take_drop : (a.drop m).take n = (a.take (m + n)).drop m := by apply List.ext_getElem <;> simp lemma drop_append_of_le_length (h : n ≤ x.length) : (x ++ₛ a).drop n = x.drop n ++ₛ a := by obtain ⟨m, hm⟩ := Nat.exists_eq_add_of_le h ext k; rcases lt_or_ge k m with _ \| hk · rw [get_drop, get_append_left, get_append_left, List.getElem_drop]; simpa [hm] · obtain ⟨p, rfl⟩ := Nat.exists_eq_add_of_le hk have hm' : m = (x.drop n).length := by simp [hm] simp_rw [get_drop, ← Nat.add_assoc, ← hm, get_append_right, hm', get_append_right] -- Take theorem reduces a proof of equality of infinite streams to an -- induction over all their finite approximations. theorem take_theorem (s₁ s₂ : Stream' α) : (∀ n : ℕ, take n s₁ = take n s₂) → s₁ = s₂ := by intro h; apply Stream'.ext; intro n induction' n with n _ · have aux := h 1 simp? [take] at aux says simp only [take, List.cons.injEq, and_true] at aux exact aux · have h₁ : some (get s₁ (succ n)) = some (get s₂ (succ n)) := by rw [← getElem?_take_succ, ← getElem?_take_succ, h (succ (succ n))] injection h₁ protected theorem cycle_g_cons (a : α) (a₁ : α) (l₁ : List α) (a₀ : α) (l₀ : List α) : Stream'.cycleG (a, a₁::l₁, a₀, l₀) = (a₁, l₁, a₀, l₀) := rfl theorem cycle_eq : ∀ (l : List α) (h : l ≠ []), cycle l h = l ++ₛ cycle l h \| [], h => absurd rfl h \| List.cons a l, _ => have gen : ∀ l' a', corec Stream'.cycleF Stream'.cycleG (a', l', a, l) = (a'::l') ++ₛ corec Stream'.cycleF Stream'.cycleG (a, l, a, l) := by intro l' induction' l' with a₁ l₁ ih · intros rw [corec_eq] rfl · intros rw [corec_eq, Stream'.cycle_g_cons, ih a₁] rfl gen l a theorem mem_cycle {a : α} {l : List α} : ∀ h : l ≠ [], a ∈ l → a ∈ cycle l h := fun h ainl => by rw [cycle_eq]; exact mem_append_stream_left _ ainl @[simp] theorem cycle_singleton (a : α) : cycle [a] (by simp) = const a := coinduction rfl fun β fr ch => by rwa [cycle_eq, const_eq] theorem tails_eq (s : Stream' α) : tails s = tail s::tails (tail s) := by unfold tails; rw [corec_eq]; rfl @[simp] theorem get_tails : ∀ (n : ℕ) (s : Stream' α), get (tails s) n = drop n (tail s) := by intro n; induction' n with n' ih · intros rfl · intro s rw [get_succ, drop_succ, tails_eq, tail_cons, ih] theorem tails_eq_iterate (s : Stream' α) : tails s = iterate tail (tail s) := rfl theorem inits_core_eq (l : List α) (s : Stream' α) : initsCore l s = l::initsCore (l ++ [head s]) (tail s) := by unfold initsCore corecOn rw [corec_eq] theorem tail_inits (s : Stream' α) : tail (inits s) = initsCore [head s, head (tail s)] (tail (tail s)) := by unfold inits rw [inits_core_eq]; rfl theorem inits_tail (s : Stream' α) : inits (tail s) = initsCore [head (tail s)] (tail (tail s)) := rfl theorem cons_get_inits_core : ∀ (a : α) (n : ℕ) (l : List α) (s : Stream' α), (a::get (initsCore l s) n) = get (initsCore (a::l) s) n := by intro a n	induction' n with n' ih · intros	Mathlib/Data/Stream/Init.lean	669	670
/- Copyright (c) 2019 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Yakov Pechersky -/ import Mathlib.Data.List.Nodup import Mathlib.Data.List.Infix import Mathlib.Data.Quot /-! # List rotation This file proves basic results about `List.rotate`, the list rotation. ## Main declarations * `List.IsRotated l₁ l₂`: States that `l₁` is a rotated version of `l₂`. * `List.cyclicPermutations l`: The list of all cyclic permutants of `l`, up to the length of `l`. ## Tags rotated, rotation, permutation, cycle -/ universe u variable {α : Type u} open Nat Function namespace List theorem rotate_mod (l : List α) (n : ℕ) : l.rotate (n % l.length) = l.rotate n := by simp [rotate] @[simp] theorem rotate_nil (n : ℕ) : ([] : List α).rotate n = [] := by simp [rotate] @[simp] theorem rotate_zero (l : List α) : l.rotate 0 = l := by simp [rotate] theorem rotate'_nil (n : ℕ) : ([] : List α).rotate' n = [] := by simp @[simp] theorem rotate'_zero (l : List α) : l.rotate' 0 = l := by cases l <;> rfl theorem rotate'_cons_succ (l : List α) (a : α) (n : ℕ) : (a :: l : List α).rotate' n.succ = (l ++ [a]).rotate' n := by simp [rotate'] @[simp] theorem length_rotate' : ∀ (l : List α) (n : ℕ), (l.rotate' n).length = l.length \| [], _ => by simp \| _ :: _, 0 => rfl \| a :: l, n + 1 => by rw [List.rotate', length_rotate' (l ++ [a]) n]; simp theorem rotate'_eq_drop_append_take : ∀ {l : List α} {n : ℕ}, n ≤ l.length → l.rotate' n = l.drop n ++ l.take n \| [], n, h => by simp [drop_append_of_le_length h] \| l, 0, h => by simp [take_append_of_le_length h] \| a :: l, n + 1, h => by have hnl : n ≤ l.length := le_of_succ_le_succ h have hnl' : n ≤ (l ++ [a]).length := by rw [length_append, length_cons, List.length]; exact le_of_succ_le h rw [rotate'_cons_succ, rotate'_eq_drop_append_take hnl', drop, take, drop_append_of_le_length hnl, take_append_of_le_length hnl]; simp theorem rotate'_rotate' : ∀ (l : List α) (n m : ℕ), (l.rotate' n).rotate' m = l.rotate' (n + m) \| a :: l, 0, m => by simp \| [], n, m => by simp \| a :: l, n + 1, m => by rw [rotate'_cons_succ, rotate'_rotate' _ n, Nat.add_right_comm, ← rotate'_cons_succ, Nat.succ_eq_add_one] @[simp] theorem rotate'_length (l : List α) : rotate' l l.length = l := by rw [rotate'_eq_drop_append_take le_rfl]; simp @[simp] theorem rotate'_length_mul (l : List α) : ∀ n : ℕ, l.rotate' (l.length * n) = l \| 0 => by simp \| n + 1 => calc l.rotate' (l.length * (n + 1)) = (l.rotate' (l.length * n)).rotate' (l.rotate' (l.length * n)).length := by simp [-rotate'_length, Nat.mul_succ, rotate'_rotate'] _ = l := by rw [rotate'_length, rotate'_length_mul l n] theorem rotate'_mod (l : List α) (n : ℕ) : l.rotate' (n % l.length) = l.rotate' n := calc l.rotate' (n % l.length) = (l.rotate' (n % l.length)).rotate' ((l.rotate' (n % l.length)).length * (n / l.length)) := by rw [rotate'_length_mul] _ = l.rotate' n := by rw [rotate'_rotate', length_rotate', Nat.mod_add_div] theorem rotate_eq_rotate' (l : List α) (n : ℕ) : l.rotate n = l.rotate' n := if h : l.length = 0 then by simp_all [length_eq_zero_iff] else by rw [← rotate'_mod, rotate'_eq_drop_append_take (le_of_lt (Nat.mod_lt _ (Nat.pos_of_ne_zero h)))] simp [rotate] @[simp] theorem rotate_cons_succ (l : List α) (a : α) (n : ℕ) : (a :: l : List α).rotate (n + 1) = (l ++ [a]).rotate n := by rw [rotate_eq_rotate', rotate_eq_rotate', rotate'_cons_succ] @[simp] theorem mem_rotate : ∀ {l : List α} {a : α} {n : ℕ}, a ∈ l.rotate n ↔ a ∈ l \| [], _, n => by simp \| a :: l, _, 0 => by simp \| a :: l, _, n + 1 => by simp [rotate_cons_succ, mem_rotate, or_comm] @[simp] theorem length_rotate (l : List α) (n : ℕ) : (l.rotate n).length = l.length := by rw [rotate_eq_rotate', length_rotate'] @[simp] theorem rotate_replicate (a : α) (n : ℕ) (k : ℕ) : (replicate n a).rotate k = replicate n a := eq_replicate_iff.2 ⟨by rw [length_rotate, length_replicate], fun b hb => eq_of_mem_replicate <\| mem_rotate.1 hb⟩ theorem rotate_eq_drop_append_take {l : List α} {n : ℕ} : n ≤ l.length → l.rotate n = l.drop n ++ l.take n := by rw [rotate_eq_rotate']; exact rotate'_eq_drop_append_take theorem rotate_eq_drop_append_take_mod {l : List α} {n : ℕ} : l.rotate n = l.drop (n % l.length) ++ l.take (n % l.length) := by rcases l.length.zero_le.eq_or_lt with hl \| hl · simp [eq_nil_of_length_eq_zero hl.symm] rw [← rotate_eq_drop_append_take (n.mod_lt hl).le, rotate_mod] @[simp] theorem rotate_append_length_eq (l l' : List α) : (l ++ l').rotate l.length = l' ++ l := by rw [rotate_eq_rotate'] induction l generalizing l' · simp · simp_all [rotate'] theorem rotate_rotate (l : List α) (n m : ℕ) : (l.rotate n).rotate m = l.rotate (n + m) := by rw [rotate_eq_rotate', rotate_eq_rotate', rotate_eq_rotate', rotate'_rotate'] @[simp] theorem rotate_length (l : List α) : rotate l l.length = l := by rw [rotate_eq_rotate', rotate'_length] @[simp] theorem rotate_length_mul (l : List α) (n : ℕ) : l.rotate (l.length * n) = l := by rw [rotate_eq_rotate', rotate'_length_mul] theorem rotate_perm (l : List α) (n : ℕ) : l.rotate n ~ l := by rw [rotate_eq_rotate'] induction' n with n hn generalizing l · simp · rcases l with - \| ⟨hd, tl⟩ · simp · rw [rotate'_cons_succ] exact (hn _).trans (perm_append_singleton _ _) @[simp] theorem nodup_rotate {l : List α} {n : ℕ} : Nodup (l.rotate n) ↔ Nodup l := (rotate_perm l n).nodup_iff @[simp] theorem rotate_eq_nil_iff {l : List α} {n : ℕ} : l.rotate n = [] ↔ l = [] := by induction' n with n hn generalizing l · simp · rcases l with - \| ⟨hd, tl⟩ · simp · simp [rotate_cons_succ, hn] theorem nil_eq_rotate_iff {l : List α} {n : ℕ} : [] = l.rotate n ↔ [] = l := by rw [eq_comm, rotate_eq_nil_iff, eq_comm] @[simp] theorem rotate_singleton (x : α) (n : ℕ) : [x].rotate n = [x] := rotate_replicate x 1 n theorem zipWith_rotate_distrib {β γ : Type} (f : α → β → γ) (l : List α) (l' : List β) (n : ℕ) (h : l.length = l'.length) : (zipWith f l l').rotate n = zipWith f (l.rotate n) (l'.rotate n) := by rw [rotate_eq_drop_append_take_mod, rotate_eq_drop_append_take_mod, rotate_eq_drop_append_take_mod, h, zipWith_append, ← drop_zipWith, ← take_zipWith, List.length_zipWith, h, min_self] rw [length_drop, length_drop, h] theorem zipWith_rotate_one {β : Type} (f : α → α → β) (x y : α) (l : List α) : zipWith f (x :: y :: l) ((x :: y :: l).rotate 1) = f x y :: zipWith f (y :: l) (l ++ [x]) := by simp theorem getElem?_rotate {l : List α} {n m : ℕ} (hml : m < l.length) : (l.rotate n)[m]? = l[(m + n) % l.length]? := by rw [rotate_eq_drop_append_take_mod] rcases lt_or_le m (l.drop (n % l.length)).length with hm \| hm · rw [getElem?_append_left hm, getElem?_drop, ← add_mod_mod] rw [length_drop, Nat.lt_sub_iff_add_lt] at hm rw [mod_eq_of_lt hm, Nat.add_comm] · have hlt : n % length l < length l := mod_lt _ (m.zero_le.trans_lt hml) rw [getElem?_append_right hm, getElem?_take_of_lt, length_drop] · congr 1 rw [length_drop] at hm have hm' := Nat.sub_le_iff_le_add'.1 hm have : n % length l + m - length l < length l := by rw [Nat.sub_lt_iff_lt_add hm'] exact Nat.add_lt_add hlt hml conv_rhs => rw [Nat.add_comm m, ← mod_add_mod, mod_eq_sub_mod hm', mod_eq_of_lt this] omega · rwa [Nat.sub_lt_iff_lt_add' hm, length_drop, Nat.sub_add_cancel hlt.le] theorem getElem_rotate (l : List α) (n : ℕ) (k : Nat) (h : k < (l.rotate n).length) : (l.rotate n)[k] = l[(k + n) % l.length]'(mod_lt _ (length_rotate l n ▸ k.zero_le.trans_lt h)) := by rw [← Option.some_inj, ← getElem?_eq_getElem, ← getElem?_eq_getElem, getElem?_rotate] exact h.trans_eq (length_rotate _ _) set_option linter.deprecated false in @[deprecated getElem?_rotate (since := "2025-02-14")] theorem get?_rotate {l : List α} {n m : ℕ} (hml : m < l.length) : (l.rotate n).get? m = l.get? ((m + n) % l.length) := by simp only [get?_eq_getElem?, length_rotate, hml, getElem?_eq_getElem, getElem_rotate] rw [← getElem?_eq_getElem] theorem get_rotate (l : List α) (n : ℕ) (k : Fin (l.rotate n).length) : (l.rotate n).get k = l.get ⟨(k + n) % l.length, mod_lt _ (length_rotate l n ▸ k.pos)⟩ := by simp [getElem_rotate] theorem head?_rotate {l : List α} {n : ℕ} (h : n < l.length) : head? (l.rotate n) = l[n]? := by rw [head?_eq_getElem?, getElem?_rotate (n.zero_le.trans_lt h), Nat.zero_add, Nat.mod_eq_of_lt h] theorem get_rotate_one (l : List α) (k : Fin (l.rotate 1).length) : (l.rotate 1).get k = l.get ⟨(k + 1) % l.length, mod_lt _ (length_rotate l 1 ▸ k.pos)⟩ := get_rotate l 1 k /-- A version of `List.getElem_rotate` that represents `l[k]` in terms of `(List.rotate l n)[⋯]`, not vice versa. Can be used instead of rewriting `List.getElem_rotate` from right to left. -/ theorem getElem_eq_getElem_rotate (l : List α) (n : ℕ) (k : Nat) (hk : k < l.length) : l[k] = ((l.rotate n)[(l.length - n % l.length + k) % l.length]' ((Nat.mod_lt _ (k.zero_le.trans_lt hk)).trans_eq (length_rotate _ _).symm)) := by rw [getElem_rotate] refine congr_arg l.get (Fin.eq_of_val_eq ?_) simp only [mod_add_mod] rw [← add_mod_mod, Nat.add_right_comm, Nat.sub_add_cancel, add_mod_left, mod_eq_of_lt] exacts [hk, (mod_lt _ (k.zero_le.trans_lt hk)).le] /-- A version of `List.get_rotate` that represents `List.get l` in terms of `List.get (List.rotate l n)`, not vice versa. Can be used instead of rewriting `List.get_rotate` from right to left. -/ theorem get_eq_get_rotate (l : List α) (n : ℕ) (k : Fin l.length) : l.get k = (l.rotate n).get ⟨(l.length - n % l.length + k) % l.length, (Nat.mod_lt _ (k.1.zero_le.trans_lt k.2)).trans_eq (length_rotate _ _).symm⟩ := by rw [get_rotate] refine congr_arg l.get (Fin.eq_of_val_eq ?_) simp only [mod_add_mod] rw [← add_mod_mod, Nat.add_right_comm, Nat.sub_add_cancel, add_mod_left, mod_eq_of_lt] exacts [k.2, (mod_lt _ (k.1.zero_le.trans_lt k.2)).le] theorem rotate_eq_self_iff_eq_replicate [hα : Nonempty α] : ∀ {l : List α}, (∀ n, l.rotate n = l) ↔ ∃ a, l = replicate l.length a \| [] => by simp \| a :: l => ⟨fun h => ⟨a, ext_getElem length_replicate.symm fun n h₁ h₂ => by rw [getElem_replicate, ← Option.some_inj, ← getElem?_eq_getElem, ← head?_rotate h₁, h, head?_cons]⟩, fun ⟨b, hb⟩ n => by rw [hb, rotate_replicate]⟩ theorem rotate_one_eq_self_iff_eq_replicate [Nonempty α] {l : List α} : l.rotate 1 = l ↔ ∃ a : α, l = List.replicate l.length a :=	⟨fun h => rotate_eq_self_iff_eq_replicate.mp fun n => Nat.rec l.rotate_zero (fun n hn => by rwa [Nat.succ_eq_add_one, ← l.rotate_rotate, hn]) n,	Mathlib/Data/List/Rotate.lean	266	268
/- Copyright (c) 2021 Justus Springer. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Justus Springer, Andrew Yang -/ import Mathlib.Algebra.Category.Ring.Colimits import Mathlib.Algebra.Category.Ring.FilteredColimits import Mathlib.Algebra.Category.Ring.Limits import Mathlib.Algebra.Order.Group.Nat import Mathlib.Geometry.RingedSpace.SheafedSpace import Mathlib.Topology.Sheaves.Stalks /-! # Ringed spaces We introduce the category of ringed spaces, as an alias for `SheafedSpace CommRingCat`. The facts collected in this file are typically stated for locally ringed spaces, but never actually make use of the locality of stalks. See for instance <https://stacks.math.columbia.edu/tag/01HZ>. -/ universe v u open CategoryTheory open TopologicalSpace open Opposite open TopCat open TopCat.Presheaf namespace AlgebraicGeometry /-- The type of Ringed spaces, as an abbreviation for `SheafedSpace CommRingCat`. -/ @[nolint checkUnivs] -- The universes appear together in the type, but separately in the value. abbrev RingedSpace : Type max (u+1) (v+1) := SheafedSpace.{v+1, v, u} CommRingCat.{v} namespace RingedSpace open SheafedSpace @[simp] lemma res_zero {X : RingedSpace.{u}} {U V : TopologicalSpace.Opens X} (hUV : U ≤ V) : (0 : X.presheaf.obj (op V)) \|_ U = (0 : X.presheaf.obj (op U)) := RingHom.map_zero _ variable (X : RingedSpace) instance : CoeSort RingedSpace Type* where coe X := X.carrier /-- If the germ of a section `f` is zero in the stalk at `x`, then `f` is zero on some neighbourhood around `x`. -/ lemma exists_res_eq_zero_of_germ_eq_zero (U : Opens X) (f : X.presheaf.obj (op U)) (x : U) (h : X.presheaf.germ U x.val x.property f = 0) : ∃ (V : Opens X) (i : V ⟶ U) (_ : x.1 ∈ V), X.presheaf.map i.op f = 0 := by have h1 : X.presheaf.germ U x.val x.property f = X.presheaf.germ U x.val x.property 0 := by simpa obtain ⟨V, hv, i, _, (hv4 : (X.presheaf.map i.op) f = (X.presheaf.map _) 0)⟩ := TopCat.Presheaf.germ_eq X.presheaf x.1 x.2 x.2 f 0 h1 use V, i, hv simpa using hv4 /-- If the germ of a section `f` is a unit in the stalk at `x`, then `f` must be a unit on some small neighborhood around `x`. -/ theorem isUnit_res_of_isUnit_germ (U : Opens X) (f : X.presheaf.obj (op U)) (x : X) (hx : x ∈ U) (h : IsUnit (X.presheaf.germ U x hx f)) : ∃ (V : Opens X) (i : V ⟶ U) (_ : x ∈ V), IsUnit (X.presheaf.map i.op f) := by obtain ⟨g', heq⟩ := h.exists_right_inv obtain ⟨V, hxV, g, rfl⟩ := X.presheaf.germ_exist x g' let W := U ⊓ V have hxW : x ∈ W := ⟨hx, hxV⟩ -- Porting note: `erw` can't write into `HEq`, so this is replaced with another `HEq` in the -- desired form replace heq : (X.presheaf.germ _ x hxW) ((X.presheaf.map (U.infLELeft V).op) f * (X.presheaf.map (U.infLERight V).op) g) = (X.presheaf.germ _ x hxW) 1 := by dsimp [germ] erw [map_mul, map_one, show X.presheaf.germ _ x hxW ((X.presheaf.map (U.infLELeft V).op) f) = X.presheaf.germ U x hx f from X.presheaf.germ_res_apply (Opens.infLELeft U V) x hxW f, show X.presheaf.germ _ x hxW (X.presheaf.map (U.infLERight V).op g) = X.presheaf.germ _ x hxV g from X.presheaf.germ_res_apply (Opens.infLERight U V) x hxW g] exact heq -- note: we have to force lean to resynthesize this as <...>.hom _ = <...>.hom _ obtain ⟨W', hxW', i₁, i₂, (heq' : (X.presheaf.map i₁.op) _ = (X.presheaf.map i₂.op) 1)⟩ := X.presheaf.germ_eq x hxW hxW _ _ heq use W', i₁ ≫ Opens.infLELeft U V, hxW' simp only [map_mul, map_one] at heq' simpa using isUnit_of_mul_eq_one _ _ heq' @[deprecated (since := "2025-02-08")] alias _root_.CommRingCat.germ_res_apply := germ_res_apply @[deprecated (since := "2025-02-08")] alias _root_.CommRingCat.germ_res_apply' := germ_res_apply' /-- If a section `f` is a unit in each stalk, `f` must be a unit. -/ theorem isUnit_of_isUnit_germ (U : Opens X) (f : X.presheaf.obj (op U)) (h : ∀ (x) (hx : x ∈ U), IsUnit (X.presheaf.germ U x hx f)) : IsUnit f := by -- We pick a cover of `U` by open sets `V x`, such that `f` is a unit on each `V x`. choose V iVU m h_unit using fun x : U => X.isUnit_res_of_isUnit_germ U f x x.2 (h x.1 x.2) have hcover : U ≤ iSup V := by intro x hxU -- Porting note: in Lean3 `rw` is sufficient erw [Opens.mem_iSup] exact ⟨⟨x, hxU⟩, m ⟨x, hxU⟩⟩ -- Let `g x` denote the inverse of `f` in `U x`. choose g hg using fun x : U => IsUnit.exists_right_inv (h_unit x) have ic : IsCompatible (sheaf X).val V g := by intro x y apply section_ext X.sheaf (V x ⊓ V y) rintro z ⟨hzVx, hzVy⟩ rw [germ_res_apply, germ_res_apply] apply (h z ((iVU x).le hzVx)).mul_right_inj.mp -- Porting note: now need explicitly typing the rewrites -- note: this is bad, I think we should replace the `FunLike` on -- concrete category with `CoeFun` rw [← germ_res_apply X.presheaf (iVU x) z hzVx f] -- Porting note: change was not necessary in Lean3 change X.presheaf.germ _ z hzVx _ * (X.presheaf.germ _ z hzVx _) = X.presheaf.germ _ z hzVx _ * X.presheaf.germ _ z hzVy (g y) rw [← RingHom.map_mul, congr_arg (X.presheaf.germ (V x) z hzVx) (hg x), germ_res_apply X.presheaf _ _ _ f, ← germ_res_apply X.presheaf (iVU y) z hzVy f, ← RingHom.map_mul, congr_arg (X.presheaf.germ (V y) z hzVy) (hg y), RingHom.map_one, RingHom.map_one] -- We claim that these local inverses glue together to a global inverse of `f`. obtain ⟨gl, gl_spec, -⟩ : -- We need to rephrase the result from `HasForget` to `CommRingCat`. ∃ gl : X.presheaf.obj (op U), (∀ i, ((sheaf X).val.map (iVU i).op) gl = g i) ∧ _ := X.sheaf.existsUnique_gluing' V U iVU hcover g ic apply isUnit_of_mul_eq_one f gl apply X.sheaf.eq_of_locally_eq' V U iVU hcover intro i -- We need to rephrase the goal from `HasForget` to `CommRingCat`. show ((sheaf X).val.map (iVU i).op).hom (f * gl) = ((sheaf X).val.map (iVU i).op) 1 rw [RingHom.map_one, RingHom.map_mul, gl_spec] exact hg i /-- The basic open of a section `f` is the set of all points `x`, such that the germ of `f` at `x` is a unit. -/ def basicOpen {U : Opens X} (f : X.presheaf.obj (op U)) : Opens X where carrier := { x : X \| ∃ (hx : x ∈ U), IsUnit (X.presheaf.germ U x hx f) } is_open' := by rw [isOpen_iff_forall_mem_open] rintro x ⟨hxU, hx⟩ obtain ⟨V, i, hxV, hf⟩ := X.isUnit_res_of_isUnit_germ U f x hxU hx use V.1 refine ⟨?_, V.2, hxV⟩ intro y hy use i.le hy convert RingHom.isUnit_map (X.presheaf.germ _ y hy).hom hf exact (X.presheaf.germ_res_apply i y hy f).symm theorem mem_basicOpen {U : Opens X} (f : X.presheaf.obj (op U)) (x : X) (hx : x ∈ U) : x ∈ X.basicOpen f ↔ IsUnit (X.presheaf.germ U x hx f) := ⟨Exists.choose_spec, (⟨hx, ·⟩)⟩ /-- A variant of `mem_basicOpen` with bundled `x : U`. -/ @[simp] theorem mem_basicOpen' {U : Opens X} (f : X.presheaf.obj (op U)) (x : U) : ↑x ∈ X.basicOpen f ↔ IsUnit (X.presheaf.germ U x.1 x.2 f) := mem_basicOpen X f x.1 x.2	@[simp]	Mathlib/Geometry/RingedSpace/Basic.lean	167	168
/- 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.GroupTheory.MonoidLocalization.Away import Mathlib.RingTheory.Ideal.Quotient.Operations import Mathlib.RingTheory.Localization.Defs import Mathlib.Algebra.Algebra.Tower /-! # Ideals in localizations of commutative rings ## Implementation notes See `Mathlib/RingTheory/Localization/Basic.lean` for a design overview. ## Tags localization, ring localization, commutative ring localization, characteristic predicate, commutative ring, field of fractions -/ namespace IsLocalization section CommSemiring variable {R : Type} [CommSemiring R] (M : Submonoid R) (S : Type) [CommSemiring S] variable [Algebra R S] [IsLocalization M S] variable {M S} in theorem mk'_mem_iff {x} {y : M} {I : Ideal S} : mk' S x y ∈ I ↔ algebraMap R S x ∈ I := by constructor <;> intro h · rw [← mk'_spec S x y, mul_comm] exact I.mul_mem_left ((algebraMap R S) y) h · rw [← mk'_spec S x y] at h obtain ⟨b, hb⟩ := isUnit_iff_exists_inv.1 (map_units S y) have := I.mul_mem_left b h rwa [mul_comm, mul_assoc, hb, mul_one] at this /-- Explicit characterization of the ideal given by `Ideal.map (algebraMap R S) I`. In practice, this ideal differs only in that the carrier set is defined explicitly. This definition is only meant to be used in proving `mem_map_algebraMap_iff`, and any proof that needs to refer to the explicit carrier set should use that theorem. -/ -- TODO: golf this using `Submodule.localized'` private def map_ideal (I : Ideal R) : Ideal S where carrier := { z : S \| ∃ x : I × M, z * algebraMap R S x.2 = algebraMap R S x.1 } zero_mem' := ⟨⟨0, 1⟩, by simp⟩ add_mem' := by rintro a b ⟨a', ha⟩ ⟨b', hb⟩ let Z : { x // x ∈ I } := ⟨(a'.2 : R) * (b'.1 : R) + (b'.2 : R) * (a'.1 : R), I.add_mem (I.mul_mem_left _ b'.1.2) (I.mul_mem_left _ a'.1.2)⟩ use ⟨Z, a'.2 * b'.2⟩ simp only [Z, RingHom.map_add, Submodule.coe_mk, Submonoid.coe_mul, RingHom.map_mul] rw [add_mul, ← mul_assoc a, ha, mul_comm (algebraMap R S a'.2) (algebraMap R S b'.2), ← mul_assoc b, hb] ring smul_mem' := by rintro c x ⟨x', hx⟩ obtain ⟨c', hc⟩ := IsLocalization.surj M c let Z : { x // x ∈ I } := ⟨c'.1 * x'.1, I.mul_mem_left c'.1 x'.1.2⟩ use ⟨Z, c'.2 * x'.2⟩ simp only [Z, ← hx, ← hc, smul_eq_mul, Submodule.coe_mk, Submonoid.coe_mul, RingHom.map_mul] ring theorem mem_map_algebraMap_iff {I : Ideal R} {z} : z ∈ Ideal.map (algebraMap R S) I ↔ ∃ x : I × M, z * algebraMap R S x.2 = algebraMap R S x.1 := by constructor · change _ → z ∈ map_ideal M S I refine fun h => Ideal.mem_sInf.1 h fun z hz => ?_ obtain ⟨y, hy⟩ := hz let Z : { x // x ∈ I } := ⟨y, hy.left⟩ use ⟨Z, 1⟩ simp [Z, hy.right] · rintro ⟨⟨a, s⟩, h⟩ rw [← Ideal.unit_mul_mem_iff_mem _ (map_units S s), mul_comm] exact h.symm ▸ Ideal.mem_map_of_mem _ a.2 lemma mk'_mem_map_algebraMap_iff (I : Ideal R) (x : R) (s : M) : IsLocalization.mk' S x s ∈ I.map (algebraMap R S) ↔ ∃ s ∈ M, s * x ∈ I := by rw [← Ideal.unit_mul_mem_iff_mem _ (IsLocalization.map_units S s), IsLocalization.mk'_spec', IsLocalization.mem_map_algebraMap_iff M] simp_rw [← map_mul, IsLocalization.eq_iff_exists M, mul_comm x, ← mul_assoc, ← Submonoid.coe_mul] exact ⟨fun ⟨⟨y, t⟩, c, h⟩ ↦ ⟨_, (c * t).2, h ▸ I.mul_mem_left c.1 y.2⟩, fun ⟨s, hs, h⟩ ↦ ⟨⟨⟨_, h⟩, ⟨s, hs⟩⟩, 1, by simp⟩⟩ lemma algebraMap_mem_map_algebraMap_iff (I : Ideal R) (x : R) : algebraMap R S x ∈ I.map (algebraMap R S) ↔ ∃ m ∈ M, m * x ∈ I := by rw [← IsLocalization.mk'_one (M := M), mk'_mem_map_algebraMap_iff] lemma map_algebraMap_ne_top_iff_disjoint (I : Ideal R) : I.map (algebraMap R S) ≠ ⊤ ↔ Disjoint (M : Set R) (I : Set R) := by simp only [ne_eq, Ideal.eq_top_iff_one, ← map_one (algebraMap R S), not_iff_comm, IsLocalization.algebraMap_mem_map_algebraMap_iff M] simp [Set.disjoint_left] include M in theorem map_comap (J : Ideal S) : Ideal.map (algebraMap R S) (Ideal.comap (algebraMap R S) J) = J := le_antisymm (Ideal.map_le_iff_le_comap.2 le_rfl) fun x hJ => by obtain ⟨r, s, hx⟩ := mk'_surjective M x rw [← hx] at hJ ⊢ exact Ideal.mul_mem_right _ _ (Ideal.mem_map_of_mem _ (show (algebraMap R S) r ∈ J from mk'_spec S r s ▸ J.mul_mem_right ((algebraMap R S) s) hJ)) theorem comap_map_of_isPrime_disjoint (I : Ideal R) (hI : I.IsPrime) (hM : Disjoint (M : Set R) I) : Ideal.comap (algebraMap R S) (Ideal.map (algebraMap R S) I) = I := by refine le_antisymm ?_ Ideal.le_comap_map refine (fun a ha => ?_) obtain ⟨⟨b, s⟩, h⟩ := (mem_map_algebraMap_iff M S).1 (Ideal.mem_comap.1 ha) replace h : algebraMap R S (s * a) = algebraMap R S b := by simpa only [← map_mul, mul_comm] using h obtain ⟨c, hc⟩ := (eq_iff_exists M S).1 h have : ↑c * ↑s * a ∈ I := by rw [mul_assoc, hc] exact I.mul_mem_left c b.2 exact (hI.mem_or_mem this).resolve_left fun hsc => hM.le_bot ⟨(c * s).2, hsc⟩ /-- If `S` is the localization of `R` at a submonoid, the ordering of ideals of `S` is embedded in the ordering of ideals of `R`. -/ def orderEmbedding : Ideal S ↪o Ideal R where toFun J := Ideal.comap (algebraMap R S) J inj' := Function.LeftInverse.injective (map_comap M S) map_rel_iff' := by rintro J₁ J₂ constructor · exact fun hJ => (map_comap M S) J₁ ▸ (map_comap M S) J₂ ▸ Ideal.map_mono hJ · exact fun hJ => Ideal.comap_mono hJ /-- If `R` is a ring, then prime ideals in the localization at `M` correspond to prime ideals in the original ring `R` that are disjoint from `M`. This lemma gives the particular case for an ideal and its comap, see `le_rel_iso_of_prime` for the more general relation isomorphism -/ theorem isPrime_iff_isPrime_disjoint (J : Ideal S) : J.IsPrime ↔ (Ideal.comap (algebraMap R S) J).IsPrime ∧ Disjoint (M : Set R) ↑(Ideal.comap (algebraMap R S) J) := by constructor · refine fun h => ⟨⟨?_, ?_⟩, Set.disjoint_left.mpr fun m hm1 hm2 => h.ne_top (Ideal.eq_top_of_isUnit_mem _ hm2 (map_units S ⟨m, hm1⟩))⟩ · refine fun hJ => h.ne_top ?_ rw [eq_top_iff, ← (orderEmbedding M S).le_iff_le] exact le_of_eq hJ.symm · intro x y hxy rw [Ideal.mem_comap, RingHom.map_mul] at hxy exact h.mem_or_mem hxy · refine fun h => ⟨fun hJ => h.left.ne_top (eq_top_iff.2 ?_), ?_⟩ · rwa [eq_top_iff, ← (orderEmbedding M S).le_iff_le] at hJ · intro x y hxy obtain ⟨a, s, ha⟩ := mk'_surjective M x obtain ⟨b, t, hb⟩ := mk'_surjective M y have : mk' S (a * b) (s * t) ∈ J := by rwa [mk'_mul, ha, hb] rw [mk'_mem_iff, ← Ideal.mem_comap] at this have this₂ := (h.1).mul_mem_iff_mem_or_mem.1 this rw [Ideal.mem_comap, Ideal.mem_comap] at this₂ rwa [← ha, ← hb, mk'_mem_iff, mk'_mem_iff] /-- If `R` is a ring, then prime ideals in the localization at `M` correspond to prime ideals in the original ring `R` that are disjoint from `M`. This lemma gives the particular case for an ideal and its map, see `le_rel_iso_of_prime` for the more general relation isomorphism, and the reverse implication -/ theorem isPrime_of_isPrime_disjoint (I : Ideal R) (hp : I.IsPrime) (hd : Disjoint (M : Set R) ↑I) : (Ideal.map (algebraMap R S) I).IsPrime := by rw [isPrime_iff_isPrime_disjoint M S, comap_map_of_isPrime_disjoint M S I hp hd] exact ⟨hp, hd⟩ theorem disjoint_comap_iff (J : Ideal S) :	Disjoint (M : Set R) (J.comap (algebraMap R S)) ↔ J ≠ ⊤ := by rw [← iff_not_comm, Set.not_disjoint_iff] constructor · rintro rfl exact ⟨1, M.one_mem, ⟨⟩⟩ · rintro ⟨x, hxM, hxJ⟩ exact J.eq_top_of_isUnit_mem hxJ (IsLocalization.map_units S ⟨x, hxM⟩) /-- If `R` is a ring, then prime ideals in the localization at `M` correspond to prime ideals in the original ring `R` that are disjoint from `M` -/ def orderIsoOfPrime : { p : Ideal S // p.IsPrime } ≃o { p : Ideal R // p.IsPrime ∧ Disjoint (M : Set R) ↑p } where toFun p := ⟨Ideal.comap (algebraMap R S) p.1, (isPrime_iff_isPrime_disjoint M S p.1).1 p.2⟩ invFun p := ⟨Ideal.map (algebraMap R S) p.1, isPrime_of_isPrime_disjoint M S p.1 p.2.1 p.2.2⟩ left_inv J := Subtype.eq (map_comap M S J) right_inv I := Subtype.eq (comap_map_of_isPrime_disjoint M S I.1 I.2.1 I.2.2) map_rel_iff' {I I'} := by constructor · exact fun h => show I.val ≤ I'.val from map_comap M S I.val ▸ map_comap M S I'.val ▸ Ideal.map_mono h exact fun h x hx => h hx include M in lemma map_radical (I : Ideal R) : I.radical.map (algebraMap R S) = (I.map (algebraMap R S)).radical := by refine (I.map_radical_le (algebraMap R S)).antisymm ?_ rintro x ⟨n, hn⟩ obtain ⟨x, s, rfl⟩ := IsLocalization.mk'_surjective M x simp only [← IsLocalization.mk'_pow, IsLocalization.mk'_mem_map_algebraMap_iff M, Submonoid.mem_powers_iff, exists_exists_eq_and] at hn ⊢ obtain ⟨s, hs, h⟩ := hn refine ⟨s, hs, n + 1, by convert I.mul_mem_left (s ^ n * x) h; ring⟩ theorem ideal_eq_iInf_comap_map_away {S : Finset R} (hS : Ideal.span (α := R) S = ⊤) (I : Ideal R) :	Mathlib/RingTheory/Localization/Ideal.lean	171	204
/- Copyright (c) 2020 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kim Morrison, Shing Tak Lam, Mario Carneiro -/ import Mathlib.Algebra.BigOperators.Intervals import Mathlib.Algebra.BigOperators.Ring.List import Mathlib.Data.Int.ModEq import Mathlib.Data.Nat.Bits import Mathlib.Data.Nat.Log import Mathlib.Data.List.Palindrome import Mathlib.Tactic.IntervalCases import Mathlib.Tactic.Linarith import Mathlib.Tactic.Ring /-! # Digits of a natural number This provides a basic API for extracting the digits of a natural number in a given base, and reconstructing numbers from their digits. We also prove some divisibility tests based on digits, in particular completing Theorem #85 from https://www.cs.ru.nl/~freek/100/. Also included is a bound on the length of `Nat.toDigits` from core. ## TODO A basic `norm_digits` tactic for proving goals of the form `Nat.digits a b = l` where `a` and `b` are numerals is not yet ported. -/ namespace Nat variable {n : ℕ} /-- (Impl.) An auxiliary definition for `digits`, to help get the desired definitional unfolding. -/ def digitsAux0 : ℕ → List ℕ \| 0 => [] \| n + 1 => [n + 1] /-- (Impl.) An auxiliary definition for `digits`, to help get the desired definitional unfolding. -/ def digitsAux1 (n : ℕ) : List ℕ := List.replicate n 1 /-- (Impl.) An auxiliary definition for `digits`, to help get the desired definitional unfolding. -/ def digitsAux (b : ℕ) (h : 2 ≤ b) : ℕ → List ℕ \| 0 => [] \| n + 1 => ((n + 1) % b) :: digitsAux b h ((n + 1) / b) decreasing_by exact Nat.div_lt_self (Nat.succ_pos _) h @[simp] theorem digitsAux_zero (b : ℕ) (h : 2 ≤ b) : digitsAux b h 0 = [] := by rw [digitsAux] theorem digitsAux_def (b : ℕ) (h : 2 ≤ b) (n : ℕ) (w : 0 < n) : digitsAux b h n = (n % b) :: digitsAux b h (n / b) := by cases n · cases w · rw [digitsAux] /-- `digits b n` gives the digits, in little-endian order, of a natural number `n` in a specified base `b`. In any base, we have `ofDigits b L = L.foldr (fun x y ↦ x + b * y) 0`. * For any `2 ≤ b`, we have `l < b` for any `l ∈ digits b n`, and the last digit is not zero. This uniquely specifies the behaviour of `digits b`. * For `b = 1`, we define `digits 1 n = List.replicate n 1`. * For `b = 0`, we define `digits 0 n = [n]`, except `digits 0 0 = []`. Note this differs from the existing `Nat.toDigits` in core, which is used for printing numerals. In particular, `Nat.toDigits b 0 = ['0']`, while `digits b 0 = []`. -/ def digits : ℕ → ℕ → List ℕ \| 0 => digitsAux0 \| 1 => digitsAux1 \| b + 2 => digitsAux (b + 2) (by norm_num) @[simp] theorem digits_zero (b : ℕ) : digits b 0 = [] := by rcases b with (_ \| ⟨_ \| ⟨_⟩⟩) <;> simp [digits, digitsAux0, digitsAux1] theorem digits_zero_zero : digits 0 0 = [] := rfl @[simp] theorem digits_zero_succ (n : ℕ) : digits 0 n.succ = [n + 1] := rfl theorem digits_zero_succ' : ∀ {n : ℕ}, n ≠ 0 → digits 0 n = [n] \| 0, h => (h rfl).elim \| _ + 1, _ => rfl @[simp] theorem digits_one (n : ℕ) : digits 1 n = List.replicate n 1 := rfl -- no `@[simp]`: dsimp can prove this theorem digits_one_succ (n : ℕ) : digits 1 (n + 1) = 1 :: digits 1 n := rfl theorem digits_add_two_add_one (b n : ℕ) : digits (b + 2) (n + 1) = ((n + 1) % (b + 2)) :: digits (b + 2) ((n + 1) / (b + 2)) := by simp [digits, digitsAux_def] @[simp] lemma digits_of_two_le_of_pos {b : ℕ} (hb : 2 ≤ b) (hn : 0 < n) : Nat.digits b n = n % b :: Nat.digits b (n / b) := by rw [Nat.eq_add_of_sub_eq hb rfl, Nat.eq_add_of_sub_eq hn rfl, Nat.digits_add_two_add_one] theorem digits_def' : ∀ {b : ℕ} (_ : 1 < b) {n : ℕ} (_ : 0 < n), digits b n = (n % b) :: digits b (n / b) \| 0, h => absurd h (by decide) \| 1, h => absurd h (by decide) \| b + 2, _ => digitsAux_def _ (by simp) _ @[simp] theorem digits_of_lt (b x : ℕ) (hx : x ≠ 0) (hxb : x < b) : digits b x = [x] := by rcases exists_eq_succ_of_ne_zero hx with ⟨x, rfl⟩ rcases Nat.exists_eq_add_of_le' ((Nat.le_add_left 1 x).trans_lt hxb) with ⟨b, rfl⟩ rw [digits_add_two_add_one, div_eq_of_lt hxb, digits_zero, mod_eq_of_lt hxb] theorem digits_add (b : ℕ) (h : 1 < b) (x y : ℕ) (hxb : x < b) (hxy : x ≠ 0 ∨ y ≠ 0) : digits b (x + b * y) = x :: digits b y := by rcases Nat.exists_eq_add_of_le' h with ⟨b, rfl : _ = _ + 2⟩ cases y · simp [hxb, hxy.resolve_right (absurd rfl)] dsimp [digits] rw [digitsAux_def] · congr · simp [Nat.add_mod, mod_eq_of_lt hxb] · simp [add_mul_div_left, div_eq_of_lt hxb] · apply Nat.succ_pos -- If we had a function converting a list into a polynomial,	-- and appropriate lemmas about that function, -- we could rewrite this in terms of that. /-- `ofDigits b L` takes a list `L` of natural numbers, and interprets them as a number in semiring, as the little-endian digits in base `b`.	Mathlib/Data/Nat/Digits.lean	137	140
/- Copyright (c) 2020 Kenji Nakagawa. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kenji Nakagawa, Anne Baanen, Filippo A. E. Nuccio -/ import Mathlib.Algebra.Algebra.Subalgebra.Pointwise import Mathlib.Algebra.Polynomial.FieldDivision import Mathlib.RingTheory.Spectrum.Maximal.Localization import Mathlib.RingTheory.ChainOfDivisors import Mathlib.RingTheory.DedekindDomain.Basic import Mathlib.RingTheory.FractionalIdeal.Operations import Mathlib.Algebra.Squarefree.Basic /-! # Dedekind domains and ideals In this file, we show a ring is a Dedekind domain iff all fractional ideals are invertible. Then we prove some results on the unique factorization monoid structure of the ideals. ## Main definitions - `IsDedekindDomainInv` alternatively defines a Dedekind domain as an integral domain where every nonzero fractional ideal is invertible. - `isDedekindDomainInv_iff` shows that this does note depend on the choice of field of fractions. - `IsDedekindDomain.HeightOneSpectrum` defines the type of nonzero prime ideals of `R`. ## Main results: - `isDedekindDomain_iff_isDedekindDomainInv` - `Ideal.uniqueFactorizationMonoid` ## Implementation notes The definitions that involve a field of fractions choose a canonical field of fractions, but are independent of that choice. The `..._iff` lemmas express this independence. Often, definitions assume that Dedekind domains are not fields. We found it more practical to add a `(h : ¬ IsField A)` assumption whenever this is explicitly needed. ## References * [D. Marcus, Number Fields][marcus1977number] * [J.W.S. Cassels, A. Fröhlich, Algebraic Number Theory][cassels1967algebraic] * [J. Neukirch, Algebraic Number Theory][Neukirch1992] ## Tags dedekind domain, dedekind ring -/ variable (R A K : Type) [CommRing R] [CommRing A] [Field K] open scoped nonZeroDivisors Polynomial section Inverse namespace FractionalIdeal variable {R₁ : Type} [CommRing R₁] [IsDomain R₁] [Algebra R₁ K] [IsFractionRing R₁ K] variable {I J : FractionalIdeal R₁⁰ K} noncomputable instance : Inv (FractionalIdeal R₁⁰ K) := ⟨fun I => 1 / I⟩ theorem inv_eq : I⁻¹ = 1 / I := rfl theorem inv_zero' : (0 : FractionalIdeal R₁⁰ K)⁻¹ = 0 := div_zero theorem inv_nonzero {J : FractionalIdeal R₁⁰ K} (h : J ≠ 0) : J⁻¹ = ⟨(1 : FractionalIdeal R₁⁰ K) / J, fractional_div_of_nonzero h⟩ := div_nonzero h theorem coe_inv_of_nonzero {J : FractionalIdeal R₁⁰ K} (h : J ≠ 0) : (↑J⁻¹ : Submodule R₁ K) = IsLocalization.coeSubmodule K ⊤ / (J : Submodule R₁ K) := by simp_rw [inv_nonzero _ h, coe_one, coe_mk, IsLocalization.coeSubmodule_top] variable {K} theorem mem_inv_iff (hI : I ≠ 0) {x : K} : x ∈ I⁻¹ ↔ ∀ y ∈ I, x * y ∈ (1 : FractionalIdeal R₁⁰ K) := mem_div_iff_of_nonzero hI theorem inv_anti_mono (hI : I ≠ 0) (hJ : J ≠ 0) (hIJ : I ≤ J) : J⁻¹ ≤ I⁻¹ := by -- Porting note: in Lean3, introducing `x` would just give `x ∈ J⁻¹ → x ∈ I⁻¹`, but -- in Lean4, it goes all the way down to the subtypes intro x simp only [val_eq_coe, mem_coe, mem_inv_iff hJ, mem_inv_iff hI] exact fun h y hy => h y (hIJ hy) theorem le_self_mul_inv {I : FractionalIdeal R₁⁰ K} (hI : I ≤ (1 : FractionalIdeal R₁⁰ K)) : I ≤ I * I⁻¹ := le_self_mul_one_div hI variable (K) theorem coe_ideal_le_self_mul_inv (I : Ideal R₁) : (I : FractionalIdeal R₁⁰ K) ≤ I * (I : FractionalIdeal R₁⁰ K)⁻¹ := le_self_mul_inv coeIdeal_le_one /-- `I⁻¹` is the inverse of `I` if `I` has an inverse. -/ theorem right_inverse_eq (I J : FractionalIdeal R₁⁰ K) (h : I * J = 1) : J = I⁻¹ := 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_inv_cancel_iff {I : FractionalIdeal R₁⁰ K} : I * I⁻¹ = 1 ↔ ∃ J, I * J = 1 := ⟨fun h => ⟨I⁻¹, h⟩, fun ⟨J, hJ⟩ => by rwa [← right_inverse_eq K I J hJ]⟩ theorem mul_inv_cancel_iff_isUnit {I : FractionalIdeal R₁⁰ K} : I * I⁻¹ = 1 ↔ IsUnit I := (mul_inv_cancel_iff K).trans isUnit_iff_exists_inv.symm variable {K' : Type*} [Field K'] [Algebra R₁ K'] [IsFractionRing R₁ K'] @[simp] protected theorem map_inv (I : FractionalIdeal R₁⁰ K) (h : K ≃ₐ[R₁] K') : I⁻¹.map (h : K →ₐ[R₁] K') = (I.map h)⁻¹ := by rw [inv_eq, FractionalIdeal.map_div, FractionalIdeal.map_one, inv_eq] open Submodule Submodule.IsPrincipal @[simp] theorem spanSingleton_inv (x : K) : (spanSingleton R₁⁰ x)⁻¹ = spanSingleton _ x⁻¹ := one_div_spanSingleton x theorem spanSingleton_div_spanSingleton (x y : K) : spanSingleton R₁⁰ x / spanSingleton R₁⁰ y = spanSingleton R₁⁰ (x / y) := by	rw [div_spanSingleton, mul_comm, spanSingleton_mul_spanSingleton, div_eq_mul_inv]	Mathlib/RingTheory/DedekindDomain/Ideal.lean	136	137
/- Copyright (c) 2021 Hunter Monroe. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Hunter Monroe, Kyle Miller, Alena Gusakov -/ import Mathlib.Combinatorics.SimpleGraph.DeleteEdges import Mathlib.Data.Fintype.Powerset /-! # Subgraphs of a simple graph A subgraph of a simple graph consists of subsets of the graph's vertices and edges such that the endpoints of each edge are present in the vertex subset. The edge subset is formalized as a sub-relation of the adjacency relation of the simple graph. ## Main definitions * `Subgraph G` is the type of subgraphs of a `G : SimpleGraph V`. * `Subgraph.neighborSet`, `Subgraph.incidenceSet`, and `Subgraph.degree` are like their `SimpleGraph` counterparts, but they refer to vertices from `G` to avoid subtype coercions. * `Subgraph.coe` is the coercion from a `G' : Subgraph G` to a `SimpleGraph G'.verts`. (In Lean 3 this could not be a `Coe` instance since the destination type depends on `G'`.) * `Subgraph.IsSpanning` for whether a subgraph is a spanning subgraph and `Subgraph.IsInduced` for whether a subgraph is an induced subgraph. * Instances for `Lattice (Subgraph G)` and `BoundedOrder (Subgraph G)`. * `SimpleGraph.toSubgraph`: If a `SimpleGraph` is a subgraph of another, then you can turn it into a member of the larger graph's `SimpleGraph.Subgraph` type. * Graph homomorphisms from a subgraph to a graph (`Subgraph.map_top`) and between subgraphs (`Subgraph.map`). ## Implementation notes * Recall that subgraphs are not determined by their vertex sets, so `SetLike` does not apply to this kind of subobject. ## TODO * Images of graph homomorphisms as subgraphs. -/ universe u v namespace SimpleGraph /-- A subgraph of a `SimpleGraph` is a subset of vertices along with a restriction of the adjacency relation that is symmetric and is supported by the vertex subset. They also form a bounded lattice. Thinking of `V → V → Prop` as `Set (V × V)`, a set of darts (i.e., half-edges), then `Subgraph.adj_sub` is that the darts of a subgraph are a subset of the darts of `G`. -/ @[ext] structure Subgraph {V : Type u} (G : SimpleGraph V) where /-- Vertices of the subgraph -/ verts : Set V /-- Edges of the subgraph -/ Adj : V → V → Prop adj_sub : ∀ {v w : V}, Adj v w → G.Adj v w edge_vert : ∀ {v w : V}, Adj v w → v ∈ verts symm : Symmetric Adj := by aesop_graph -- Porting note: Originally `by obviously` initialize_simps_projections SimpleGraph.Subgraph (Adj → adj) variable {ι : Sort} {V : Type u} {W : Type v} /-- The one-vertex subgraph. -/ @[simps] protected def singletonSubgraph (G : SimpleGraph V) (v : V) : G.Subgraph where verts := {v} Adj := ⊥ adj_sub := False.elim edge_vert := False.elim symm _ _ := False.elim /-- The one-edge subgraph. -/ @[simps] def subgraphOfAdj (G : SimpleGraph V) {v w : V} (hvw : G.Adj v w) : G.Subgraph where verts := {v, w} Adj a b := s(v, w) = s(a, b) adj_sub h := by rw [← G.mem_edgeSet, ← h] exact hvw edge_vert {a b} h := by apply_fun fun e ↦ a ∈ e at h simp only [Sym2.mem_iff, true_or, eq_iff_iff, iff_true] at h exact h namespace Subgraph variable {G : SimpleGraph V} {G₁ G₂ : G.Subgraph} {a b : V} protected theorem loopless (G' : Subgraph G) : Irreflexive G'.Adj := fun v h ↦ G.loopless v (G'.adj_sub h) theorem adj_comm (G' : Subgraph G) (v w : V) : G'.Adj v w ↔ G'.Adj w v := ⟨fun x ↦ G'.symm x, fun x ↦ G'.symm x⟩ @[symm] theorem adj_symm (G' : Subgraph G) {u v : V} (h : G'.Adj u v) : G'.Adj v u := G'.symm h protected theorem Adj.symm {G' : Subgraph G} {u v : V} (h : G'.Adj u v) : G'.Adj v u := G'.symm h protected theorem Adj.adj_sub {H : G.Subgraph} {u v : V} (h : H.Adj u v) : G.Adj u v := H.adj_sub h protected theorem Adj.fst_mem {H : G.Subgraph} {u v : V} (h : H.Adj u v) : u ∈ H.verts := H.edge_vert h protected theorem Adj.snd_mem {H : G.Subgraph} {u v : V} (h : H.Adj u v) : v ∈ H.verts := h.symm.fst_mem protected theorem Adj.ne {H : G.Subgraph} {u v : V} (h : H.Adj u v) : u ≠ v := h.adj_sub.ne theorem adj_congr_of_sym2 {H : G.Subgraph} {u v w x : V} (h2 : s(u, v) = s(w, x)) : H.Adj u v ↔ H.Adj w x := by simp only [Sym2.eq, Sym2.rel_iff', Prod.mk.injEq, Prod.swap_prod_mk] at h2 rcases h2 with hl \| hr · rw [hl.1, hl.2] · rw [hr.1, hr.2, Subgraph.adj_comm] /-- Coercion from `G' : Subgraph G` to a `SimpleGraph G'.verts`. -/ @[simps] protected def coe (G' : Subgraph G) : SimpleGraph G'.verts where Adj v w := G'.Adj v w symm _ _ h := G'.symm h loopless v h := loopless G v (G'.adj_sub h) @[simp] theorem coe_adj_sub (G' : Subgraph G) (u v : G'.verts) (h : G'.coe.Adj u v) : G.Adj u v := G'.adj_sub h -- Given `h : H.Adj u v`, then `h.coe : H.coe.Adj ⟨u, _⟩ ⟨v, _⟩`. protected theorem Adj.coe {H : G.Subgraph} {u v : V} (h : H.Adj u v) : H.coe.Adj ⟨u, H.edge_vert h⟩ ⟨v, H.edge_vert h.symm⟩ := h instance (G : SimpleGraph V) (H : Subgraph G) [DecidableRel H.Adj] : DecidableRel H.coe.Adj := fun a b ↦ ‹DecidableRel H.Adj› _ _ /-- A subgraph is called a spanning subgraph* if it contains all the vertices of `G`. -/ def IsSpanning (G' : Subgraph G) : Prop := ∀ v : V, v ∈ G'.verts theorem isSpanning_iff {G' : Subgraph G} : G'.IsSpanning ↔ G'.verts = Set.univ := Set.eq_univ_iff_forall.symm protected alias ⟨IsSpanning.verts_eq_univ, _⟩ := isSpanning_iff /-- Coercion from `Subgraph G` to `SimpleGraph V`. If `G'` is a spanning subgraph, then `G'.spanningCoe` yields an isomorphic graph. In general, this adds in all vertices from `V` as isolated vertices. -/ @[simps] protected def spanningCoe (G' : Subgraph G) : SimpleGraph V where Adj := G'.Adj symm := G'.symm loopless v hv := G.loopless v (G'.adj_sub hv) @[simp] theorem Adj.of_spanningCoe {G' : Subgraph G} {u v : G'.verts} (h : G'.spanningCoe.Adj u v) : G.Adj u v := G'.adj_sub h lemma spanningCoe_le (G' : G.Subgraph) : G'.spanningCoe ≤ G := fun _ _ ↦ G'.3 theorem spanningCoe_inj : G₁.spanningCoe = G₂.spanningCoe ↔ G₁.Adj = G₂.Adj := by simp [Subgraph.spanningCoe] lemma mem_of_adj_spanningCoe {v w : V} {s : Set V} (G : SimpleGraph s) (hadj : G.spanningCoe.Adj v w) : v ∈ s := by aesop @[simp] lemma spanningCoe_subgraphOfAdj {v w : V} (hadj : G.Adj v w) : (G.subgraphOfAdj hadj).spanningCoe = fromEdgeSet {s(v, w)} := by ext v w aesop /-- `spanningCoe` is equivalent to `coe` for a subgraph that `IsSpanning`. -/ @[simps] def spanningCoeEquivCoeOfSpanning (G' : Subgraph G) (h : G'.IsSpanning) : G'.spanningCoe ≃g G'.coe where toFun v := ⟨v, h v⟩ invFun v := v left_inv _ := rfl right_inv _ := rfl map_rel_iff' := Iff.rfl /-- A subgraph is called an induced subgraph if vertices of `G'` are adjacent if they are adjacent in `G`. -/ def IsInduced (G' : Subgraph G) : Prop := ∀ ⦃v⦄, v ∈ G'.verts → ∀ ⦃w⦄, w ∈ G'.verts → G.Adj v w → G'.Adj v w @[simp] protected lemma IsInduced.adj {G' : G.Subgraph} (hG' : G'.IsInduced) {a b : G'.verts} : G'.Adj a b ↔ G.Adj a b := ⟨coe_adj_sub _ _ _, hG' a.2 b.2⟩ /-- `H.support` is the set of vertices that form edges in the subgraph `H`. -/ def support (H : Subgraph G) : Set V := Rel.dom H.Adj theorem mem_support (H : Subgraph G) {v : V} : v ∈ H.support ↔ ∃ w, H.Adj v w := Iff.rfl theorem support_subset_verts (H : Subgraph G) : H.support ⊆ H.verts := fun _ ⟨_, h⟩ ↦ H.edge_vert h /-- `G'.neighborSet v` is the set of vertices adjacent to `v` in `G'`. -/ def neighborSet (G' : Subgraph G) (v : V) : Set V := {w \| G'.Adj v w} theorem neighborSet_subset (G' : Subgraph G) (v : V) : G'.neighborSet v ⊆ G.neighborSet v := fun _ ↦ G'.adj_sub theorem neighborSet_subset_verts (G' : Subgraph G) (v : V) : G'.neighborSet v ⊆ G'.verts := fun _ h ↦ G'.edge_vert (adj_symm G' h) @[simp] theorem mem_neighborSet (G' : Subgraph G) (v w : V) : w ∈ G'.neighborSet v ↔ G'.Adj v w := Iff.rfl /-- A subgraph as a graph has equivalent neighbor sets. -/ def coeNeighborSetEquiv {G' : Subgraph G} (v : G'.verts) : G'.coe.neighborSet v ≃ G'.neighborSet v where toFun w := ⟨w, w.2⟩ invFun w := ⟨⟨w, G'.edge_vert (G'.adj_symm w.2)⟩, w.2⟩ left_inv _ := rfl right_inv _ := rfl /-- The edge set of `G'` consists of a subset of edges of `G`. -/ def edgeSet (G' : Subgraph G) : Set (Sym2 V) := Sym2.fromRel G'.symm theorem edgeSet_subset (G' : Subgraph G) : G'.edgeSet ⊆ G.edgeSet := Sym2.ind (fun _ _ ↦ G'.adj_sub) @[simp] protected lemma mem_edgeSet {G' : Subgraph G} {v w : V} : s(v, w) ∈ G'.edgeSet ↔ G'.Adj v w := .rfl @[simp] lemma edgeSet_coe {G' : G.Subgraph} : G'.coe.edgeSet = Sym2.map (↑) ⁻¹' G'.edgeSet := by ext e; induction e using Sym2.ind; simp lemma image_coe_edgeSet_coe (G' : G.Subgraph) : Sym2.map (↑) '' G'.coe.edgeSet = G'.edgeSet := by rw [edgeSet_coe, Set.image_preimage_eq_iff] rintro e he induction e using Sym2.ind with \| h a b => rw [Subgraph.mem_edgeSet] at he exact ⟨s(⟨a, edge_vert _ he⟩, ⟨b, edge_vert _ he.symm⟩), Sym2.map_pair_eq ..⟩ theorem mem_verts_of_mem_edge {G' : Subgraph G} {e : Sym2 V} {v : V} (he : e ∈ G'.edgeSet) (hv : v ∈ e) : v ∈ G'.verts := by induction e rcases Sym2.mem_iff.mp hv with (rfl \| rfl) · exact G'.edge_vert he · exact G'.edge_vert (G'.symm he) /-- The `incidenceSet` is the set of edges incident to a given vertex. -/ def incidenceSet (G' : Subgraph G) (v : V) : Set (Sym2 V) := {e ∈ G'.edgeSet \| v ∈ e} theorem incidenceSet_subset_incidenceSet (G' : Subgraph G) (v : V) : G'.incidenceSet v ⊆ G.incidenceSet v := fun _ h ↦ ⟨G'.edgeSet_subset h.1, h.2⟩ theorem incidenceSet_subset (G' : Subgraph G) (v : V) : G'.incidenceSet v ⊆ G'.edgeSet := fun _ h ↦ h.1 /-- Give a vertex as an element of the subgraph's vertex type. -/ abbrev vert (G' : Subgraph G) (v : V) (h : v ∈ G'.verts) : G'.verts := ⟨v, h⟩ /-- Create an equal copy of a subgraph (see `copy_eq`) with possibly different definitional equalities. See Note [range copy pattern]. -/ def copy (G' : Subgraph G) (V'' : Set V) (hV : V'' = G'.verts) (adj' : V → V → Prop) (hadj : adj' = G'.Adj) : Subgraph G where verts := V'' Adj := adj' adj_sub := hadj.symm ▸ G'.adj_sub edge_vert := hV.symm ▸ hadj.symm ▸ G'.edge_vert symm := hadj.symm ▸ G'.symm theorem copy_eq (G' : Subgraph G) (V'' : Set V) (hV : V'' = G'.verts) (adj' : V → V → Prop) (hadj : adj' = G'.Adj) : G'.copy V'' hV adj' hadj = G' := Subgraph.ext hV hadj /-- The union of two subgraphs. -/ instance : Max G.Subgraph where max G₁ G₂ := { verts := G₁.verts ∪ G₂.verts Adj := G₁.Adj ⊔ G₂.Adj adj_sub := fun hab => Or.elim hab (fun h => G₁.adj_sub h) fun h => G₂.adj_sub h edge_vert := Or.imp (fun h => G₁.edge_vert h) fun h => G₂.edge_vert h symm := fun _ _ => Or.imp G₁.adj_symm G₂.adj_symm } /-- The intersection of two subgraphs. -/ instance : Min G.Subgraph where min G₁ G₂ := { verts := G₁.verts ∩ G₂.verts Adj := G₁.Adj ⊓ G₂.Adj adj_sub := fun hab => G₁.adj_sub hab.1 edge_vert := And.imp (fun h => G₁.edge_vert h) fun h => G₂.edge_vert h symm := fun _ _ => And.imp G₁.adj_symm G₂.adj_symm } /-- The `top` subgraph is `G` as a subgraph of itself. -/ instance : Top G.Subgraph where top := { verts := Set.univ Adj := G.Adj adj_sub := id edge_vert := @fun v _ _ => Set.mem_univ v symm := G.symm } /-- The `bot` subgraph is the subgraph with no vertices or edges. -/ instance : Bot G.Subgraph where bot := { verts := ∅ Adj := ⊥ adj_sub := False.elim edge_vert := False.elim symm := fun _ _ => id } instance : SupSet G.Subgraph where sSup s := { verts := ⋃ G' ∈ s, verts G' Adj := fun a b => ∃ G' ∈ s, Adj G' a b adj_sub := by rintro a b ⟨G', -, hab⟩ exact G'.adj_sub hab edge_vert := by rintro a b ⟨G', hG', hab⟩ exact Set.mem_iUnion₂_of_mem hG' (G'.edge_vert hab) symm := fun a b h => by simpa [adj_comm] using h } instance : InfSet G.Subgraph where sInf s := { verts := ⋂ G' ∈ s, verts G' Adj := fun a b => (∀ ⦃G'⦄, G' ∈ s → Adj G' a b) ∧ G.Adj a b adj_sub := And.right edge_vert := fun hab => Set.mem_iInter₂_of_mem fun G' hG' => G'.edge_vert <\| hab.1 hG' symm := fun _ _ => And.imp (forall₂_imp fun _ _ => Adj.symm) G.adj_symm } @[simp] theorem sup_adj : (G₁ ⊔ G₂).Adj a b ↔ G₁.Adj a b ∨ G₂.Adj a b := Iff.rfl @[simp] theorem inf_adj : (G₁ ⊓ G₂).Adj a b ↔ G₁.Adj a b ∧ G₂.Adj a b := Iff.rfl @[simp] theorem top_adj : (⊤ : Subgraph G).Adj a b ↔ G.Adj a b := Iff.rfl @[simp] theorem not_bot_adj : ¬ (⊥ : Subgraph G).Adj a b := not_false @[simp] theorem verts_sup (G₁ G₂ : G.Subgraph) : (G₁ ⊔ G₂).verts = G₁.verts ∪ G₂.verts := rfl @[simp] theorem verts_inf (G₁ G₂ : G.Subgraph) : (G₁ ⊓ G₂).verts = G₁.verts ∩ G₂.verts := rfl @[simp] theorem verts_top : (⊤ : G.Subgraph).verts = Set.univ := rfl @[simp] theorem verts_bot : (⊥ : G.Subgraph).verts = ∅ := rfl @[simp] theorem sSup_adj {s : Set G.Subgraph} : (sSup s).Adj a b ↔ ∃ G ∈ s, Adj G a b := Iff.rfl @[simp] theorem sInf_adj {s : Set G.Subgraph} : (sInf s).Adj a b ↔ (∀ G' ∈ s, Adj G' a b) ∧ G.Adj a b := Iff.rfl @[simp] theorem iSup_adj {f : ι → G.Subgraph} : (⨆ i, f i).Adj a b ↔ ∃ i, (f i).Adj a b := by simp [iSup] @[simp] theorem iInf_adj {f : ι → G.Subgraph} : (⨅ i, f i).Adj a b ↔ (∀ i, (f i).Adj a b) ∧ G.Adj a b := by simp [iInf] theorem sInf_adj_of_nonempty {s : Set G.Subgraph} (hs : s.Nonempty) : (sInf s).Adj a b ↔ ∀ G' ∈ s, Adj G' a b := sInf_adj.trans <\| and_iff_left_of_imp <\| by obtain ⟨G', hG'⟩ := hs exact fun h => G'.adj_sub (h _ hG') theorem iInf_adj_of_nonempty [Nonempty ι] {f : ι → G.Subgraph} : (⨅ i, f i).Adj a b ↔ ∀ i, (f i).Adj a b := by rw [iInf, sInf_adj_of_nonempty (Set.range_nonempty _)] simp @[simp] theorem verts_sSup (s : Set G.Subgraph) : (sSup s).verts = ⋃ G' ∈ s, verts G' := rfl @[simp] theorem verts_sInf (s : Set G.Subgraph) : (sInf s).verts = ⋂ G' ∈ s, verts G' := rfl @[simp] theorem verts_iSup {f : ι → G.Subgraph} : (⨆ i, f i).verts = ⋃ i, (f i).verts := by simp [iSup] @[simp] theorem verts_iInf {f : ι → G.Subgraph} : (⨅ i, f i).verts = ⋂ i, (f i).verts := by simp [iInf] @[simp] lemma coe_bot : (⊥ : G.Subgraph).coe = ⊥ := rfl @[simp] lemma IsInduced.top : (⊤ : G.Subgraph).IsInduced := fun _ _ _ _ ↦ id /-- The graph isomorphism between the top element of `G.subgraph` and `G`. -/ def topIso : (⊤ : G.Subgraph).coe ≃g G where toFun := (↑) invFun a := ⟨a, Set.mem_univ _⟩ left_inv _ := Subtype.eta .. right_inv _ := rfl map_rel_iff' := .rfl theorem verts_spanningCoe_injective : (fun G' : Subgraph G => (G'.verts, G'.spanningCoe)).Injective := by intro G₁ G₂ h rw [Prod.ext_iff] at h exact Subgraph.ext h.1 (spanningCoe_inj.1 h.2) /-- For subgraphs `G₁`, `G₂`, `G₁ ≤ G₂` iff `G₁.verts ⊆ G₂.verts` and `∀ a b, G₁.adj a b → G₂.adj a b`. -/ instance distribLattice : DistribLattice G.Subgraph := { show DistribLattice G.Subgraph from verts_spanningCoe_injective.distribLattice _ (fun _ _ => rfl) fun _ _ => rfl with le := fun x y => x.verts ⊆ y.verts ∧ ∀ ⦃v w : V⦄, x.Adj v w → y.Adj v w } instance : BoundedOrder (Subgraph G) where top := ⊤ bot := ⊥ le_top x := ⟨Set.subset_univ _, fun _ _ => x.adj_sub⟩ bot_le _ := ⟨Set.empty_subset _, fun _ _ => False.elim⟩ /-- Note that subgraphs do not form a Boolean algebra, because of `verts`. -/ def completelyDistribLatticeMinimalAxioms : CompletelyDistribLattice.MinimalAxioms G.Subgraph := { Subgraph.distribLattice with le := (· ≤ ·) sup := (· ⊔ ·) inf := (· ⊓ ·) top := ⊤ bot := ⊥ le_top := fun G' => ⟨Set.subset_univ _, fun _ _ => G'.adj_sub⟩ bot_le := fun _ => ⟨Set.empty_subset _, fun _ _ => False.elim⟩ sSup := sSup -- Porting note: needed `apply` here to modify elaboration; previously the term itself was fine. le_sSup := fun s G' hG' => ⟨by apply Set.subset_iUnion₂ G' hG', fun _ _ hab => ⟨G', hG', hab⟩⟩ sSup_le := fun s G' hG' => ⟨Set.iUnion₂_subset fun _ hH => (hG' _ hH).1, by rintro a b ⟨H, hH, hab⟩ exact (hG' _ hH).2 hab⟩ sInf := sInf sInf_le := fun _ G' hG' => ⟨Set.iInter₂_subset G' hG', fun _ _ hab => hab.1 hG'⟩ le_sInf := fun _ G' hG' => ⟨Set.subset_iInter₂ fun _ hH => (hG' _ hH).1, fun _ _ hab => ⟨fun _ hH => (hG' _ hH).2 hab, G'.adj_sub hab⟩⟩ iInf_iSup_eq := fun f => Subgraph.ext (by simpa using iInf_iSup_eq) (by ext; simp [Classical.skolem]) } instance : CompletelyDistribLattice G.Subgraph := .ofMinimalAxioms completelyDistribLatticeMinimalAxioms @[gcongr] lemma verts_mono {H H' : G.Subgraph} (h : H ≤ H') : H.verts ⊆ H'.verts := h.1 lemma verts_monotone : Monotone (verts : G.Subgraph → Set V) := fun _ _ h ↦ h.1 @[simps] instance subgraphInhabited : Inhabited (Subgraph G) := ⟨⊥⟩ @[simp] theorem neighborSet_sup {H H' : G.Subgraph} (v : V) : (H ⊔ H').neighborSet v = H.neighborSet v ∪ H'.neighborSet v := rfl @[simp] theorem neighborSet_inf {H H' : G.Subgraph} (v : V) : (H ⊓ H').neighborSet v = H.neighborSet v ∩ H'.neighborSet v := rfl @[simp] theorem neighborSet_top (v : V) : (⊤ : G.Subgraph).neighborSet v = G.neighborSet v := rfl @[simp] theorem neighborSet_bot (v : V) : (⊥ : G.Subgraph).neighborSet v = ∅ := rfl @[simp] theorem neighborSet_sSup (s : Set G.Subgraph) (v : V) : (sSup s).neighborSet v = ⋃ G' ∈ s, neighborSet G' v := by ext simp @[simp] theorem neighborSet_sInf (s : Set G.Subgraph) (v : V) : (sInf s).neighborSet v = (⋂ G' ∈ s, neighborSet G' v) ∩ G.neighborSet v := by ext simp @[simp] theorem neighborSet_iSup (f : ι → G.Subgraph) (v : V) : (⨆ i, f i).neighborSet v = ⋃ i, (f i).neighborSet v := by simp [iSup] @[simp] theorem neighborSet_iInf (f : ι → G.Subgraph) (v : V) : (⨅ i, f i).neighborSet v = (⋂ i, (f i).neighborSet v) ∩ G.neighborSet v := by simp [iInf] @[simp] theorem edgeSet_top : (⊤ : Subgraph G).edgeSet = G.edgeSet := rfl @[simp] theorem edgeSet_bot : (⊥ : Subgraph G).edgeSet = ∅ := Set.ext <\| Sym2.ind (by simp) @[simp] theorem edgeSet_inf {H₁ H₂ : Subgraph G} : (H₁ ⊓ H₂).edgeSet = H₁.edgeSet ∩ H₂.edgeSet := Set.ext <\| Sym2.ind (by simp) @[simp] theorem edgeSet_sup {H₁ H₂ : Subgraph G} : (H₁ ⊔ H₂).edgeSet = H₁.edgeSet ∪ H₂.edgeSet := Set.ext <\| Sym2.ind (by simp) @[simp] theorem edgeSet_sSup (s : Set G.Subgraph) : (sSup s).edgeSet = ⋃ G' ∈ s, edgeSet G' := by ext e induction e simp @[simp] theorem edgeSet_sInf (s : Set G.Subgraph) : (sInf s).edgeSet = (⋂ G' ∈ s, edgeSet G') ∩ G.edgeSet := by ext e induction e simp @[simp] theorem edgeSet_iSup (f : ι → G.Subgraph) : (⨆ i, f i).edgeSet = ⋃ i, (f i).edgeSet := by simp [iSup] @[simp] theorem edgeSet_iInf (f : ι → G.Subgraph) : (⨅ i, f i).edgeSet = (⋂ i, (f i).edgeSet) ∩ G.edgeSet := by simp [iInf] @[simp] theorem spanningCoe_top : (⊤ : Subgraph G).spanningCoe = G := rfl @[simp] theorem spanningCoe_bot : (⊥ : Subgraph G).spanningCoe = ⊥ := rfl /-- Turn a subgraph of a `SimpleGraph` into a member of its subgraph type. -/ @[simps] def _root_.SimpleGraph.toSubgraph (H : SimpleGraph V) (h : H ≤ G) : G.Subgraph where verts := Set.univ Adj := H.Adj adj_sub e := h e edge_vert _ := Set.mem_univ _ symm := H.symm theorem support_mono {H H' : Subgraph G} (h : H ≤ H') : H.support ⊆ H'.support := Rel.dom_mono h.2 theorem _root_.SimpleGraph.toSubgraph.isSpanning (H : SimpleGraph V) (h : H ≤ G) : (toSubgraph H h).IsSpanning := Set.mem_univ theorem spanningCoe_le_of_le {H H' : Subgraph G} (h : H ≤ H') : H.spanningCoe ≤ H'.spanningCoe := h.2 @[simp] lemma sup_spanningCoe (H H' : Subgraph G) : (H ⊔ H').spanningCoe = H.spanningCoe ⊔ H'.spanningCoe := rfl /-- The top of the `Subgraph G` lattice is equivalent to the graph itself. -/ def topEquiv : (⊤ : Subgraph G).coe ≃g G where toFun v := ↑v invFun v := ⟨v, trivial⟩ left_inv _ := rfl right_inv _ := rfl map_rel_iff' := Iff.rfl /-- The bottom of the `Subgraph G` lattice is equivalent to the empty graph on the empty vertex type. -/ def botEquiv : (⊥ : Subgraph G).coe ≃g (⊥ : SimpleGraph Empty) where toFun v := v.property.elim invFun v := v.elim left_inv := fun ⟨_, h⟩ ↦ h.elim right_inv v := v.elim map_rel_iff' := Iff.rfl theorem edgeSet_mono {H₁ H₂ : Subgraph G} (h : H₁ ≤ H₂) : H₁.edgeSet ≤ H₂.edgeSet := Sym2.ind h.2 theorem _root_.Disjoint.edgeSet {H₁ H₂ : Subgraph G} (h : Disjoint H₁ H₂) : Disjoint H₁.edgeSet H₂.edgeSet := disjoint_iff_inf_le.mpr <\| by simpa using edgeSet_mono h.le_bot section map variable {G' : SimpleGraph W} {f : G →g G'} /-- Graph homomorphisms induce a covariant function on subgraphs. -/ @[simps] protected def map (f : G →g G') (H : G.Subgraph) : G'.Subgraph where verts := f '' H.verts Adj := Relation.Map H.Adj f f adj_sub := by rintro _ _ ⟨u, v, h, rfl, rfl⟩ exact f.map_rel (H.adj_sub h) edge_vert := by rintro _ _ ⟨u, v, h, rfl, rfl⟩ exact Set.mem_image_of_mem _ (H.edge_vert h) symm := by rintro _ _ ⟨u, v, h, rfl, rfl⟩ exact ⟨v, u, H.symm h, rfl, rfl⟩ @[simp] lemma map_id (H : G.Subgraph) : H.map Hom.id = H := by ext <;> simp lemma map_comp {U : Type} {G'' : SimpleGraph U} (H : G.Subgraph) (f : G →g G') (g : G' →g G'') : H.map (g.comp f) = (H.map f).map g := by ext <;> simp [Subgraph.map] @[gcongr] lemma map_mono {H₁ H₂ : G.Subgraph} (hH : H₁ ≤ H₂) : H₁.map f ≤ H₂.map f := by constructor · intro simp only [map_verts, Set.mem_image, forall_exists_index, and_imp] rintro v hv rfl exact ⟨_, hH.1 hv, rfl⟩ · rintro _ _ ⟨u, v, ha, rfl, rfl⟩ exact ⟨_, _, hH.2 ha, rfl, rfl⟩ lemma map_monotone : Monotone (Subgraph.map f) := fun _ _ ↦ map_mono theorem map_sup (f : G →g G') (H₁ H₂ : G.Subgraph) : (H₁ ⊔ H₂).map f = H₁.map f ⊔ H₂.map f := by ext <;> simp [Set.image_union, map_adj, sup_adj, Relation.Map, or_and_right, exists_or] @[simp] lemma map_iso_top {H : SimpleGraph W} (e : G ≃g H) : Subgraph.map e.toHom ⊤ = ⊤ := by ext <;> simp [Relation.Map, e.apply_eq_iff_eq_symm_apply, ← e.map_rel_iff] @[simp] lemma edgeSet_map (f : G →g G') (H : G.Subgraph) : (H.map f).edgeSet = Sym2.map f '' H.edgeSet := Sym2.fromRel_relationMap .. end map /-- Graph homomorphisms induce a contravariant function on subgraphs. -/ @[simps] protected def comap {G' : SimpleGraph W} (f : G →g G') (H : G'.Subgraph) : G.Subgraph where verts := f ⁻¹' H.verts Adj u v := G.Adj u v ∧ H.Adj (f u) (f v) adj_sub h := h.1 edge_vert h := Set.mem_preimage.1 (H.edge_vert h.2) symm _ _ h := ⟨G.symm h.1, H.symm h.2⟩ theorem comap_monotone {G' : SimpleGraph W} (f : G →g G') : Monotone (Subgraph.comap f) := by intro H H' h constructor · intro simp only [comap_verts, Set.mem_preimage] apply h.1 · intro v w simp +contextual only [comap_adj, and_imp, true_and] intro apply h.2 @[simp] lemma comap_equiv_top {H : SimpleGraph W} (f : G →g H) : Subgraph.comap f ⊤ = ⊤ := by ext <;> simp +contextual [f.map_adj] theorem map_le_iff_le_comap {G' : SimpleGraph W} (f : G →g G') (H : G.Subgraph) (H' : G'.Subgraph) : H.map f ≤ H' ↔ H ≤ H'.comap f := by refine ⟨fun h ↦ ⟨fun v hv ↦ ?_, fun v w hvw ↦ ?_⟩, fun h ↦ ⟨fun v ↦ ?_, fun v w ↦ ?_⟩⟩ · simp only [comap_verts, Set.mem_preimage] exact h.1 ⟨v, hv, rfl⟩ · simp only [H.adj_sub hvw, comap_adj, true_and] exact h.2 ⟨v, w, hvw, rfl, rfl⟩ · simp only [map_verts, Set.mem_image, forall_exists_index, and_imp] rintro w hw rfl exact h.1 hw · simp only [Relation.Map, map_adj, forall_exists_index, and_imp] rintro u u' hu rfl rfl exact (h.2 hu).2 instance [DecidableEq V] [Fintype V] [DecidableRel G.Adj] : Fintype G.Subgraph := by refine .ofBijective (α := {H : Finset V × (V → V → Bool) // (∀ a b, H.2 a b → G.Adj a b) ∧ (∀ a b, H.2 a b → a ∈ H.1) ∧ ∀ a b, H.2 a b = H.2 b a}) (fun H ↦ ⟨H.1.1, fun a b ↦ H.1.2 a b, @H.2.1, @H.2.2.1, by simp [Symmetric, H.2.2.2]⟩) ⟨?_, fun H ↦ ?_⟩ · rintro ⟨⟨_, _⟩, -⟩ ⟨⟨_, _⟩, -⟩ simp [funext_iff] · classical exact ⟨⟨(H.verts.toFinset, fun a b ↦ H.Adj a b), fun a b ↦ by simpa using H.adj_sub, fun a b ↦ by simpa using H.edge_vert, by simp [H.adj_comm]⟩, by simp⟩ instance [Finite V] : Finite G.Subgraph := by classical cases nonempty_fintype V; infer_instance /-- Given two subgraphs, one a subgraph of the other, there is an induced injective homomorphism of the subgraphs as graphs. -/ @[simps] def inclusion {x y : Subgraph G} (h : x ≤ y) : x.coe →g y.coe where toFun v := ⟨↑v, And.left h v.property⟩ map_rel' hvw := h.2 hvw theorem inclusion.injective {x y : Subgraph G} (h : x ≤ y) : Function.Injective (inclusion h) := by intro v w h rw [inclusion, DFunLike.coe, Subtype.mk_eq_mk] at h exact Subtype.ext h /-- There is an induced injective homomorphism of a subgraph of `G` into `G`. -/ @[simps] protected def hom (x : Subgraph G) : x.coe →g G where toFun v := v map_rel' := x.adj_sub @[simp] lemma coe_hom (x : Subgraph G) : (x.hom : x.verts → V) = (fun (v : x.verts) => (v : V)) := rfl theorem hom_injective {x : Subgraph G} : Function.Injective x.hom := fun _ _ ↦ Subtype.ext @[deprecated (since := "2025-03-15")] alias hom.injective := hom_injective @[simp] lemma map_hom_top (G' : G.Subgraph) : Subgraph.map G'.hom ⊤ = G' := by aesop (add unfold safe Relation.Map, unsafe G'.edge_vert, unsafe Adj.symm) /-- There is an induced injective homomorphism of a subgraph of `G` as a spanning subgraph into `G`. -/ @[simps] def spanningHom (x : Subgraph G) : x.spanningCoe →g G where toFun := id map_rel' := x.adj_sub theorem spanningHom_injective {x : Subgraph G} : Function.Injective x.spanningHom := fun _ _ ↦ id @[deprecated (since := "2025-03-15")] alias spanningHom.injective := spanningHom_injective theorem neighborSet_subset_of_subgraph {x y : Subgraph G} (h : x ≤ y) (v : V) : x.neighborSet v ⊆ y.neighborSet v := fun _ h' ↦ h.2 h' instance neighborSet.decidablePred (G' : Subgraph G) [h : DecidableRel G'.Adj] (v : V) : DecidablePred (· ∈ G'.neighborSet v) := h v /-- If a graph is locally finite at a vertex, then so is a subgraph of that graph. -/ instance finiteAt {G' : Subgraph G} (v : G'.verts) [DecidableRel G'.Adj] [Fintype (G.neighborSet v)] : Fintype (G'.neighborSet v) := Set.fintypeSubset (G.neighborSet v) (G'.neighborSet_subset v) /-- If a subgraph is locally finite at a vertex, then so are subgraphs of that subgraph. This is not an instance because `G''` cannot be inferred. -/ def finiteAtOfSubgraph {G' G'' : Subgraph G} [DecidableRel G'.Adj] (h : G' ≤ G'') (v : G'.verts) [Fintype (G''.neighborSet v)] : Fintype (G'.neighborSet v) := Set.fintypeSubset (G''.neighborSet v) (neighborSet_subset_of_subgraph h v) instance (G' : Subgraph G) [Fintype G'.verts] (v : V) [DecidablePred (· ∈ G'.neighborSet v)] : Fintype (G'.neighborSet v) := Set.fintypeSubset G'.verts (neighborSet_subset_verts G' v) instance coeFiniteAt {G' : Subgraph G} (v : G'.verts) [Fintype (G'.neighborSet v)] : Fintype (G'.coe.neighborSet v) := Fintype.ofEquiv _ (coeNeighborSetEquiv v).symm theorem IsSpanning.card_verts [Fintype V] {G' : Subgraph G} [Fintype G'.verts] (h : G'.IsSpanning) : G'.verts.toFinset.card = Fintype.card V := by simp only [isSpanning_iff.1 h, Set.toFinset_univ] congr /-- The degree of a vertex in a subgraph. It's zero for vertices outside the subgraph. -/ def degree (G' : Subgraph G) (v : V) [Fintype (G'.neighborSet v)] : ℕ := Fintype.card (G'.neighborSet v) theorem finset_card_neighborSet_eq_degree {G' : Subgraph G} {v : V} [Fintype (G'.neighborSet v)] : (G'.neighborSet v).toFinset.card = G'.degree v := by rw [degree, Set.toFinset_card] theorem degree_le (G' : Subgraph G) (v : V) [Fintype (G'.neighborSet v)] [Fintype (G.neighborSet v)] : G'.degree v ≤ G.degree v := by rw [← card_neighborSet_eq_degree] exact Set.card_le_card (G'.neighborSet_subset v) theorem degree_le' (G' G'' : Subgraph G) (h : G' ≤ G'') (v : V) [Fintype (G'.neighborSet v)] [Fintype (G''.neighborSet v)] : G'.degree v ≤ G''.degree v := Set.card_le_card (neighborSet_subset_of_subgraph h v) @[simp] theorem coe_degree (G' : Subgraph G) (v : G'.verts) [Fintype (G'.coe.neighborSet v)] [Fintype (G'.neighborSet v)] : G'.coe.degree v = G'.degree v := by rw [← card_neighborSet_eq_degree] exact Fintype.card_congr (coeNeighborSetEquiv v) @[simp] theorem degree_spanningCoe {G' : G.Subgraph} (v : V) [Fintype (G'.neighborSet v)] [Fintype (G'.spanningCoe.neighborSet v)] : G'.spanningCoe.degree v = G'.degree v := by rw [← card_neighborSet_eq_degree, Subgraph.degree] congr! theorem degree_eq_one_iff_unique_adj {G' : Subgraph G} {v : V} [Fintype (G'.neighborSet v)] : G'.degree v = 1 ↔ ∃! w : V, G'.Adj v w := by rw [← finset_card_neighborSet_eq_degree, Finset.card_eq_one, Finset.singleton_iff_unique_mem] simp only [Set.mem_toFinset, mem_neighborSet] lemma neighborSet_eq_of_equiv {v : V} {H : Subgraph G} (h : G.neighborSet v ≃ H.neighborSet v) (hfin : (G.neighborSet v).Finite) : H.neighborSet v = G.neighborSet v := by lift H.neighborSet v to Finset V using h.set_finite_iff.mp hfin with s hs lift G.neighborSet v to Finset V using hfin with t ht refine congrArg _ <\| Finset.eq_of_subset_of_card_le ?_ (Finset.card_eq_of_equiv h).le rw [← Finset.coe_subset, hs, ht] exact H.neighborSet_subset _ lemma adj_iff_of_neighborSet_equiv {v : V} {H : Subgraph G} (h : G.neighborSet v ≃ H.neighborSet v) (hfin : (G.neighborSet v).Finite) : ∀ {w}, H.Adj v w ↔ G.Adj v w := Set.ext_iff.mp (neighborSet_eq_of_equiv h hfin) _ end Subgraph section MkProperties /-! ### Properties of `singletonSubgraph` and `subgraphOfAdj` -/ variable {G : SimpleGraph V} {G' : SimpleGraph W} instance nonempty_singletonSubgraph_verts (v : V) : Nonempty (G.singletonSubgraph v).verts := ⟨⟨v, Set.mem_singleton v⟩⟩ @[simp] theorem singletonSubgraph_le_iff (v : V) (H : G.Subgraph) : G.singletonSubgraph v ≤ H ↔ v ∈ H.verts := by refine ⟨fun h ↦ h.1 (Set.mem_singleton v), ?_⟩ intro h constructor · rwa [singletonSubgraph_verts, Set.singleton_subset_iff] · exact fun _ _ ↦ False.elim @[simp] theorem map_singletonSubgraph (f : G →g G') {v : V} : Subgraph.map f (G.singletonSubgraph v) = G'.singletonSubgraph (f v) := by ext <;> simp only [Relation.Map, Subgraph.map_adj, singletonSubgraph_adj, Pi.bot_apply, exists_and_left, and_iff_left_iff_imp, IsEmpty.forall_iff, Subgraph.map_verts, singletonSubgraph_verts, Set.image_singleton] exact False.elim @[simp] theorem neighborSet_singletonSubgraph (v w : V) : (G.singletonSubgraph v).neighborSet w = ∅ := rfl @[simp] theorem edgeSet_singletonSubgraph (v : V) : (G.singletonSubgraph v).edgeSet = ∅ := Sym2.fromRel_bot theorem eq_singletonSubgraph_iff_verts_eq (H : G.Subgraph) {v : V} : H = G.singletonSubgraph v ↔ H.verts = {v} := by refine ⟨fun h ↦ by rw [h, singletonSubgraph_verts], fun h ↦ ?_⟩ ext · rw [h, singletonSubgraph_verts] · simp only [Prop.bot_eq_false, singletonSubgraph_adj, Pi.bot_apply, iff_false] intro ha have ha1 := ha.fst_mem have ha2 := ha.snd_mem rw [h, Set.mem_singleton_iff] at ha1 ha2 subst_vars exact ha.ne rfl instance nonempty_subgraphOfAdj_verts {v w : V} (hvw : G.Adj v w) : Nonempty (G.subgraphOfAdj hvw).verts := ⟨⟨v, by simp⟩⟩ @[simp] theorem edgeSet_subgraphOfAdj {v w : V} (hvw : G.Adj v w) : (G.subgraphOfAdj hvw).edgeSet = {s(v, w)} := by ext e refine e.ind ?_ simp only [eq_comm, Set.mem_singleton_iff, Subgraph.mem_edgeSet, subgraphOfAdj_adj, forall₂_true_iff] lemma subgraphOfAdj_le_of_adj {v w : V} (H : G.Subgraph) (h : H.Adj v w) : G.subgraphOfAdj (H.adj_sub h) ≤ H := by constructor · intro x rintro (rfl \| rfl) <;> simp [H.edge_vert h, H.edge_vert h.symm] · simp only [subgraphOfAdj_adj, Sym2.eq, Sym2.rel_iff] rintro _ _ (⟨rfl, rfl⟩ \| ⟨rfl, rfl⟩) <;> simp [h, h.symm] theorem subgraphOfAdj_symm {v w : V} (hvw : G.Adj v w) : G.subgraphOfAdj hvw.symm = G.subgraphOfAdj hvw := by ext <;> simp [or_comm, and_comm] @[simp] theorem map_subgraphOfAdj (f : G →g G') {v w : V} (hvw : G.Adj v w) : Subgraph.map f (G.subgraphOfAdj hvw) = G'.subgraphOfAdj (f.map_adj hvw) := by ext · simp only [Subgraph.map_verts, subgraphOfAdj_verts, Set.mem_image, Set.mem_insert_iff, Set.mem_singleton_iff] constructor · rintro ⟨u, rfl \| rfl, rfl⟩ <;> simp · rintro (rfl \| rfl) · use v simp · use w simp · simp only [Relation.Map, Subgraph.map_adj, subgraphOfAdj_adj, Sym2.eq, Sym2.rel_iff] constructor · rintro ⟨a, b, ⟨rfl, rfl⟩ \| ⟨rfl, rfl⟩, rfl, rfl⟩ <;> simp · rintro (⟨rfl, rfl⟩ \| ⟨rfl, rfl⟩) · use v, w simp · use w, v simp theorem neighborSet_subgraphOfAdj_subset {u v w : V} (hvw : G.Adj v w) : (G.subgraphOfAdj hvw).neighborSet u ⊆ {v, w} := (G.subgraphOfAdj hvw).neighborSet_subset_verts _ @[simp] theorem neighborSet_fst_subgraphOfAdj {v w : V} (hvw : G.Adj v w) : (G.subgraphOfAdj hvw).neighborSet v = {w} := by ext u suffices w = u ↔ u = w by simpa [hvw.ne.symm] using this rw [eq_comm] @[simp] theorem neighborSet_snd_subgraphOfAdj {v w : V} (hvw : G.Adj v w) : (G.subgraphOfAdj hvw).neighborSet w = {v} := by rw [subgraphOfAdj_symm hvw.symm] exact neighborSet_fst_subgraphOfAdj hvw.symm @[simp] theorem neighborSet_subgraphOfAdj_of_ne_of_ne {u v w : V} (hvw : G.Adj v w) (hv : u ≠ v) (hw : u ≠ w) : (G.subgraphOfAdj hvw).neighborSet u = ∅ := by ext simp [hv.symm, hw.symm] theorem neighborSet_subgraphOfAdj [DecidableEq V] {u v w : V} (hvw : G.Adj v w) : (G.subgraphOfAdj hvw).neighborSet u = (if u = v then {w} else ∅) ∪ if u = w then {v} else ∅ := by split_ifs <;> subst_vars <;> simp [] theorem singletonSubgraph_fst_le_subgraphOfAdj {u v : V} {h : G.Adj u v} : G.singletonSubgraph u ≤ G.subgraphOfAdj h := by simp theorem singletonSubgraph_snd_le_subgraphOfAdj {u v : V} {h : G.Adj u v} : G.singletonSubgraph v ≤ G.subgraphOfAdj h := by simp @[simp] lemma support_subgraphOfAdj {u v : V} (h : G.Adj u v) : (G.subgraphOfAdj h).support = {u , v} := by ext rw [Subgraph.mem_support] simp only [subgraphOfAdj_adj, Sym2.eq, Sym2.rel_iff', Prod.mk.injEq, Prod.swap_prod_mk] refine ⟨?_, fun h ↦ h.elim (fun hl ↦ ⟨v, .inl ⟨hl.symm, rfl⟩⟩) fun hr ↦ ⟨u, .inr ⟨rfl, hr.symm⟩⟩⟩ rintro ⟨_, hw⟩ exact hw.elim (fun h1 ↦ .inl h1.1.symm) fun hr ↦ .inr hr.2.symm end MkProperties namespace Subgraph variable {G : SimpleGraph V} /-! ### Subgraphs of subgraphs -/ /-- Given a subgraph of a subgraph of `G`, construct a subgraph of `G`. -/ protected abbrev coeSubgraph {G' : G.Subgraph} : G'.coe.Subgraph → G.Subgraph := Subgraph.map G'.hom /-- Given a subgraph of `G`, restrict it to being a subgraph of another subgraph `G'` by taking the portion of `G` that intersects `G'`. -/ protected abbrev restrict {G' : G.Subgraph} : G.Subgraph → G'.coe.Subgraph := Subgraph.comap G'.hom @[simp] lemma verts_coeSubgraph {G' : Subgraph G} (G'' : Subgraph G'.coe) : (Subgraph.coeSubgraph G'').verts = (G''.verts : Set V) := rfl lemma coeSubgraph_adj {G' : G.Subgraph} (G'' : G'.coe.Subgraph) (v w : V) : (G'.coeSubgraph G'').Adj v w ↔ ∃ (hv : v ∈ G'.verts) (hw : w ∈ G'.verts), G''.Adj ⟨v, hv⟩ ⟨w, hw⟩ := by simp [Relation.Map] lemma restrict_adj {G' G'' : G.Subgraph} (v w : G'.verts) : (G'.restrict G'').Adj v w ↔ G'.Adj v w ∧ G''.Adj v w := Iff.rfl theorem restrict_coeSubgraph {G' : G.Subgraph} (G'' : G'.coe.Subgraph) : Subgraph.restrict (Subgraph.coeSubgraph G'') = G'' := by ext · simp · rw [restrict_adj, coeSubgraph_adj] simpa using G''.adj_sub theorem coeSubgraph_injective (G' : G.Subgraph) : Function.Injective (Subgraph.coeSubgraph : G'.coe.Subgraph → G.Subgraph) := Function.LeftInverse.injective restrict_coeSubgraph lemma coeSubgraph_le {H : G.Subgraph} (H' : H.coe.Subgraph) : Subgraph.coeSubgraph H' ≤ H := by constructor · simp · rintro v w ⟨_, _, h, rfl, rfl⟩ exact H'.adj_sub h lemma coeSubgraph_restrict_eq {H : G.Subgraph} (H' : G.Subgraph) : Subgraph.coeSubgraph (H.restrict H') = H ⊓ H' := by ext · simp [and_comm] · simp_rw [coeSubgraph_adj, restrict_adj] simp only [exists_and_left, exists_prop, inf_adj, and_congr_right_iff] intro h simp [H.edge_vert h, H.edge_vert h.symm] /-! ### Edge deletion -/ /-- Given a subgraph `G'` and a set of vertex pairs, remove all of the corresponding edges from its edge set, if present. See also: `SimpleGraph.deleteEdges`. -/ def deleteEdges (G' : G.Subgraph) (s : Set (Sym2 V)) : G.Subgraph where verts := G'.verts Adj := G'.Adj \ Sym2.ToRel s adj_sub h' := G'.adj_sub h'.1 edge_vert h' := G'.edge_vert h'.1 symm a b := by simp [G'.adj_comm, Sym2.eq_swap] section DeleteEdges variable {G' : G.Subgraph} (s : Set (Sym2 V)) @[simp] theorem deleteEdges_verts : (G'.deleteEdges s).verts = G'.verts := rfl @[simp] theorem deleteEdges_adj (v w : V) : (G'.deleteEdges s).Adj v w ↔ G'.Adj v w ∧ ¬s(v, w) ∈ s := Iff.rfl @[simp] theorem deleteEdges_deleteEdges (s s' : Set (Sym2 V)) : (G'.deleteEdges s).deleteEdges s' = G'.deleteEdges (s ∪ s') := by ext <;> simp [and_assoc, not_or] @[simp] theorem deleteEdges_empty_eq : G'.deleteEdges ∅ = G' := by ext <;> simp @[simp] theorem deleteEdges_spanningCoe_eq : G'.spanningCoe.deleteEdges s = (G'.deleteEdges s).spanningCoe := by ext simp theorem deleteEdges_coe_eq (s : Set (Sym2 G'.verts)) : G'.coe.deleteEdges s = (G'.deleteEdges (Sym2.map (↑) '' s)).coe := by ext ⟨v, hv⟩ ⟨w, hw⟩ simp only [SimpleGraph.deleteEdges_adj, coe_adj, deleteEdges_adj, Set.mem_image, not_exists, not_and, and_congr_right_iff] intro constructor · intro hs refine Sym2.ind ?_ rintro ⟨v', hv'⟩ ⟨w', hw'⟩ simp only [Sym2.map_pair_eq, Sym2.eq] contrapose! rintro (_ \| _) <;> simpa only [Sym2.eq_swap] · intro h' hs exact h' _ hs rfl theorem coe_deleteEdges_eq (s : Set (Sym2 V)) : (G'.deleteEdges s).coe = G'.coe.deleteEdges (Sym2.map (↑) ⁻¹' s) := by ext ⟨v, hv⟩ ⟨w, hw⟩ simp theorem deleteEdges_le : G'.deleteEdges s ≤ G' := by constructor <;> simp +contextual [subset_rfl] theorem deleteEdges_le_of_le {s s' : Set (Sym2 V)} (h : s ⊆ s') : G'.deleteEdges s' ≤ G'.deleteEdges s := by constructor <;> simp +contextual only [deleteEdges_verts, deleteEdges_adj, true_and, and_imp, subset_rfl] exact fun _ _ _ hs' hs ↦ hs' (h hs) @[simp] theorem deleteEdges_inter_edgeSet_left_eq : G'.deleteEdges (G'.edgeSet ∩ s) = G'.deleteEdges s := by ext <;> simp +contextual [imp_false] @[simp] theorem deleteEdges_inter_edgeSet_right_eq : G'.deleteEdges (s ∩ G'.edgeSet) = G'.deleteEdges s := by ext <;> simp +contextual [imp_false] theorem coe_deleteEdges_le : (G'.deleteEdges s).coe ≤ (G'.coe : SimpleGraph G'.verts) := by intro v w simp +contextual theorem spanningCoe_deleteEdges_le (G' : G.Subgraph) (s : Set (Sym2 V)) : (G'.deleteEdges s).spanningCoe ≤ G'.spanningCoe := spanningCoe_le_of_le (deleteEdges_le s) end DeleteEdges /-! ### Induced subgraphs -/ /- Given a subgraph, we can change its vertex set while removing any invalid edges, which gives induced subgraphs. See also `SimpleGraph.induce` for the `SimpleGraph` version, which, unlike for subgraphs, results in a graph with a different vertex type. -/ /-- The induced subgraph of a subgraph. The expectation is that `s ⊆ G'.verts` for the usual notion of an induced subgraph, but, in general, `s` is taken to be the new vertex set and edges are induced from the subgraph `G'`. -/ @[simps] def induce (G' : G.Subgraph) (s : Set V) : G.Subgraph where verts := s Adj u v := u ∈ s ∧ v ∈ s ∧ G'.Adj u v adj_sub h := G'.adj_sub h.2.2 edge_vert h := h.1 symm _ _ h := ⟨h.2.1, h.1, G'.symm h.2.2⟩ theorem _root_.SimpleGraph.induce_eq_coe_induce_top (s : Set V) : G.induce s = ((⊤ : G.Subgraph).induce s).coe := by ext simp section Induce variable {G' G'' : G.Subgraph} {s s' : Set V} theorem induce_mono (hg : G' ≤ G'') (hs : s ⊆ s') : G'.induce s ≤ G''.induce s' := by constructor · simp [hs] · simp +contextual only [induce_adj, and_imp] intro v w hv hw ha exact ⟨hs hv, hs hw, hg.2 ha⟩ @[gcongr, mono] theorem induce_mono_left (hg : G' ≤ G'') : G'.induce s ≤ G''.induce s := induce_mono hg subset_rfl @[gcongr, mono] theorem induce_mono_right (hs : s ⊆ s') : G'.induce s ≤ G'.induce s' := induce_mono le_rfl hs @[simp] theorem induce_empty : G'.induce ∅ = ⊥ := by ext <;> simp @[simp] theorem induce_self_verts : G'.induce G'.verts = G' := by ext · simp · constructor <;> simp +contextual only [induce_adj, imp_true_iff, and_true] exact fun ha ↦ ⟨G'.edge_vert ha, G'.edge_vert ha.symm⟩ lemma le_induce_top_verts : G' ≤ (⊤ : G.Subgraph).induce G'.verts := calc G' = G'.induce G'.verts := Subgraph.induce_self_verts.symm _ ≤ (⊤ : G.Subgraph).induce G'.verts := Subgraph.induce_mono_left le_top lemma le_induce_union : G'.induce s ⊔ G'.induce s' ≤ G'.induce (s ∪ s') := by constructor · simp only [verts_sup, induce_verts, Set.Subset.rfl] · simp only [sup_adj, induce_adj, Set.mem_union] rintro v w (h \| h) <;> simp [h] lemma le_induce_union_left : G'.induce s ≤ G'.induce (s ∪ s') := by exact (sup_le_iff.mp le_induce_union).1 lemma le_induce_union_right : G'.induce s' ≤ G'.induce (s ∪ s') := by exact (sup_le_iff.mp le_induce_union).2 theorem singletonSubgraph_eq_induce {v : V} : G.singletonSubgraph v = (⊤ : G.Subgraph).induce {v} := by ext <;> simp +contextual [-Set.bot_eq_empty, Prop.bot_eq_false] theorem subgraphOfAdj_eq_induce {v w : V} (hvw : G.Adj v w) : G.subgraphOfAdj hvw = (⊤ : G.Subgraph).induce {v, w} := by ext · simp · constructor · intro h simp only [subgraphOfAdj_adj, Sym2.eq, Sym2.rel_iff] at h obtain ⟨rfl, rfl⟩ \| ⟨rfl, rfl⟩ := h <;> simp [hvw, hvw.symm] · intro h simp only [induce_adj, Set.mem_insert_iff, Set.mem_singleton_iff, top_adj] at h obtain ⟨rfl \| rfl, rfl \| rfl, ha⟩ := h <;> first \|exact (ha.ne rfl).elim\|simp instance instDecidableRel_induce_adj (s : Set V) [∀ a, Decidable (a ∈ s)] [DecidableRel G'.Adj] : DecidableRel (G'.induce s).Adj := fun _ _ ↦ instDecidableAnd end Induce /-- Given a subgraph and a set of vertices, delete all the vertices from the subgraph, if present. Any edges incident to the deleted vertices are deleted as well. -/ abbrev deleteVerts (G' : G.Subgraph) (s : Set V) : G.Subgraph := G'.induce (G'.verts \ s) section DeleteVerts variable {G' : G.Subgraph} {s : Set V} theorem deleteVerts_verts : (G'.deleteVerts s).verts = G'.verts \ s := rfl	theorem deleteVerts_adj {u v : V} : (G'.deleteVerts s).Adj u v ↔ u ∈ G'.verts ∧ ¬u ∈ s ∧ v ∈ G'.verts ∧ ¬v ∈ s ∧ G'.Adj u v := by simp [and_assoc]	Mathlib/Combinatorics/SimpleGraph/Subgraph.lean	1,218	1,220
/- 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 -/ import Mathlib.Algebra.Order.SuccPred import Mathlib.Data.Sum.Order import Mathlib.SetTheory.Cardinal.Basic import Mathlib.Tactic.PPWithUniv /-! # Ordinals Ordinals are defined as equivalences of well-ordered sets under order isomorphism. They are endowed with a total order, where an ordinal is smaller than another one if it embeds into it as an initial segment (or, equivalently, in any way). This total order is well founded. ## Main definitions * `Ordinal`: the type of ordinals (in a given universe) * `Ordinal.type r`: given a well-founded order `r`, this is the corresponding ordinal * `Ordinal.typein r a`: given a well-founded order `r` on a type `α`, and `a : α`, the ordinal corresponding to all elements smaller than `a`. * `enum r ⟨o, h⟩`: given a well-order `r` on a type `α`, and an ordinal `o` strictly smaller than the ordinal corresponding to `r` (this is the assumption `h`), returns the `o`-th element of `α`. In other words, the elements of `α` can be enumerated using ordinals up to `type r`. * `Ordinal.card o`: the cardinality of an ordinal `o`. * `Ordinal.lift` lifts an ordinal in universe `u` to an ordinal in universe `max u v`. For a version registering additionally that this is an initial segment embedding, see `Ordinal.liftInitialSeg`. For a version registering that it is a principal segment embedding if `u < v`, see `Ordinal.liftPrincipalSeg`. * `Ordinal.omega0` or `ω` is the order type of `ℕ`. It is called this to match `Cardinal.aleph0` and so that the omega function can be named `Ordinal.omega`. This definition is universe polymorphic: `Ordinal.omega0.{u} : Ordinal.{u}` (contrast with `ℕ : Type`, which lives in a specific universe). In some cases the universe level has to be given explicitly. * `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`. The main properties of addition (and the other operations on ordinals) are stated and proved in `Mathlib/SetTheory/Ordinal/Arithmetic.lean`. Here, we only introduce it and prove its basic properties to deduce the fact that the order on ordinals is total (and well founded). * `succ o` is the successor of the ordinal `o`. * `Cardinal.ord c`: when `c` is a cardinal, `ord c` is the smallest ordinal with this cardinality. It is the canonical way to represent a cardinal with an ordinal. A conditionally complete linear order with bot structure is registered on ordinals, where `⊥` is `0`, the ordinal corresponding to the empty type, and `Inf` is the minimum for nonempty sets and `0` for the empty set by convention. ## Notations * `ω` is a notation for the first infinite ordinal in the locale `Ordinal`. -/ assert_not_exists Module Field noncomputable section open Function Cardinal Set Equiv Order open scoped Cardinal InitialSeg universe u v w variable {α : Type u} {β : Type v} {γ : Type w} {r : α → α → Prop} {s : β → β → Prop} {t : γ → γ → Prop} /-! ### Definition of ordinals -/ /-- Bundled structure registering a well order on a type. Ordinals will be defined as a quotient of this type. -/ structure WellOrder : Type (u + 1) where /-- The underlying type of the order. -/ α : Type u /-- The underlying relation of the order. -/ r : α → α → Prop /-- The proposition that `r` is a well-ordering for `α`. -/ wo : IsWellOrder α r attribute [instance] WellOrder.wo namespace WellOrder instance inhabited : Inhabited WellOrder := ⟨⟨PEmpty, _, inferInstanceAs (IsWellOrder PEmpty EmptyRelation)⟩⟩ end WellOrder /-- Equivalence relation on well orders on arbitrary types in universe `u`, given by order isomorphism. -/ instance Ordinal.isEquivalent : Setoid WellOrder where r := fun ⟨_, r, _⟩ ⟨_, s, _⟩ => Nonempty (r ≃r s) iseqv := ⟨fun _ => ⟨RelIso.refl _⟩, fun ⟨e⟩ => ⟨e.symm⟩, fun ⟨e₁⟩ ⟨e₂⟩ => ⟨e₁.trans e₂⟩⟩ /-- `Ordinal.{u}` is the type of well orders in `Type u`, up to order isomorphism. -/ @[pp_with_univ] def Ordinal : Type (u + 1) := Quotient Ordinal.isEquivalent /-- A "canonical" type order-isomorphic to the ordinal `o`, living in the same universe. This is defined through the axiom of choice. Use this over `Iio o` only when it is paramount to have a `Type u` rather than a `Type (u + 1)`. -/ def Ordinal.toType (o : Ordinal.{u}) : Type u := o.out.α instance hasWellFounded_toType (o : Ordinal) : WellFoundedRelation o.toType := ⟨o.out.r, o.out.wo.wf⟩ instance linearOrder_toType (o : Ordinal) : LinearOrder o.toType := @IsWellOrder.linearOrder _ o.out.r o.out.wo instance wellFoundedLT_toType_lt (o : Ordinal) : WellFoundedLT o.toType := o.out.wo.toIsWellFounded namespace Ordinal noncomputable instance (o : Ordinal) : SuccOrder o.toType := SuccOrder.ofLinearWellFoundedLT o.toType /-! ### Basic properties of the order type -/ /-- The order type of a well order is an ordinal. -/ def type (r : α → α → Prop) [wo : IsWellOrder α r] : Ordinal := ⟦⟨α, r, wo⟩⟧ /-- `typeLT α` is an abbreviation for the order type of the `<` relation of `α`. -/ scoped notation "typeLT " α:70 => @Ordinal.type α (· < ·) inferInstance instance zero : Zero Ordinal := ⟨type <\| @EmptyRelation PEmpty⟩ instance inhabited : Inhabited Ordinal := ⟨0⟩ instance one : One Ordinal := ⟨type <\| @EmptyRelation PUnit⟩ @[simp] theorem type_toType (o : Ordinal) : typeLT o.toType = o := o.out_eq theorem type_eq {α β} {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] : type r = type s ↔ Nonempty (r ≃r s) := Quotient.eq' theorem _root_.RelIso.ordinal_type_eq {α β} {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] (h : r ≃r s) : type r = type s := type_eq.2 ⟨h⟩ theorem type_eq_zero_of_empty (r) [IsWellOrder α r] [IsEmpty α] : type r = 0 := (RelIso.relIsoOfIsEmpty r _).ordinal_type_eq @[simp] theorem type_eq_zero_iff_isEmpty [IsWellOrder α r] : type r = 0 ↔ IsEmpty α := ⟨fun h => let ⟨s⟩ := type_eq.1 h s.toEquiv.isEmpty, @type_eq_zero_of_empty α r _⟩ theorem type_ne_zero_iff_nonempty [IsWellOrder α r] : type r ≠ 0 ↔ Nonempty α := by simp theorem type_ne_zero_of_nonempty (r) [IsWellOrder α r] [h : Nonempty α] : type r ≠ 0 := type_ne_zero_iff_nonempty.2 h theorem type_pEmpty : type (@EmptyRelation PEmpty) = 0 := rfl theorem type_empty : type (@EmptyRelation Empty) = 0 := type_eq_zero_of_empty _ theorem type_eq_one_of_unique (r) [IsWellOrder α r] [Nonempty α] [Subsingleton α] : type r = 1 := by cases nonempty_unique α exact (RelIso.ofUniqueOfIrrefl r _).ordinal_type_eq @[simp] theorem type_eq_one_iff_unique [IsWellOrder α r] : type r = 1 ↔ Nonempty (Unique α) := ⟨fun h ↦ let ⟨s⟩ := type_eq.1 h; ⟨s.toEquiv.unique⟩, fun ⟨_⟩ ↦ type_eq_one_of_unique r⟩ theorem type_pUnit : type (@EmptyRelation PUnit) = 1 := rfl theorem type_unit : type (@EmptyRelation Unit) = 1 := rfl @[simp] theorem toType_empty_iff_eq_zero {o : Ordinal} : IsEmpty o.toType ↔ o = 0 := by rw [← @type_eq_zero_iff_isEmpty o.toType (· < ·), type_toType] instance isEmpty_toType_zero : IsEmpty (toType 0) := toType_empty_iff_eq_zero.2 rfl @[simp] theorem toType_nonempty_iff_ne_zero {o : Ordinal} : Nonempty o.toType ↔ o ≠ 0 := by rw [← @type_ne_zero_iff_nonempty o.toType (· < ·), type_toType] protected theorem one_ne_zero : (1 : Ordinal) ≠ 0 := type_ne_zero_of_nonempty _ instance nontrivial : Nontrivial Ordinal.{u} := ⟨⟨1, 0, Ordinal.one_ne_zero⟩⟩ /-- `Quotient.inductionOn` specialized to ordinals. Not to be confused with well-founded recursion `Ordinal.induction`. -/ @[elab_as_elim] theorem inductionOn {C : Ordinal → Prop} (o : Ordinal) (H : ∀ (α r) [IsWellOrder α r], C (type r)) : C o := Quot.inductionOn o fun ⟨α, r, wo⟩ => @H α r wo /-- `Quotient.inductionOn₂` specialized to ordinals. Not to be confused with well-founded recursion `Ordinal.induction`. -/ @[elab_as_elim] theorem inductionOn₂ {C : Ordinal → Ordinal → Prop} (o₁ o₂ : Ordinal) (H : ∀ (α r) [IsWellOrder α r] (β s) [IsWellOrder β s], C (type r) (type s)) : C o₁ o₂ := Quotient.inductionOn₂ o₁ o₂ fun ⟨α, r, wo₁⟩ ⟨β, s, wo₂⟩ => @H α r wo₁ β s wo₂ /-- `Quotient.inductionOn₃` specialized to ordinals. Not to be confused with well-founded recursion `Ordinal.induction`. -/ @[elab_as_elim] theorem inductionOn₃ {C : Ordinal → Ordinal → Ordinal → Prop} (o₁ o₂ o₃ : Ordinal) (H : ∀ (α r) [IsWellOrder α r] (β s) [IsWellOrder β s] (γ t) [IsWellOrder γ t], C (type r) (type s) (type t)) : C o₁ o₂ o₃ := Quotient.inductionOn₃ o₁ o₂ o₃ fun ⟨α, r, wo₁⟩ ⟨β, s, wo₂⟩ ⟨γ, t, wo₃⟩ => @H α r wo₁ β s wo₂ γ t wo₃ open Classical in /-- To prove a result on ordinals, it suffices to prove it for order types of well-orders. -/ @[elab_as_elim] theorem inductionOnWellOrder {C : Ordinal → Prop} (o : Ordinal) (H : ∀ (α) [LinearOrder α] [WellFoundedLT α], C (typeLT α)) : C o := inductionOn o fun α r wo ↦ @H α (linearOrderOfSTO r) wo.toIsWellFounded open Classical in /-- To define a function on ordinals, it suffices to define them on order types of well-orders. Since `LinearOrder` is data-carrying, `liftOnWellOrder_type` is not a definitional equality, unlike `Quotient.liftOn_mk` which is always def-eq. -/ def liftOnWellOrder {δ : Sort v} (o : Ordinal) (f : ∀ (α) [LinearOrder α] [WellFoundedLT α], δ) (c : ∀ (α) [LinearOrder α] [WellFoundedLT α] (β) [LinearOrder β] [WellFoundedLT β], typeLT α = typeLT β → f α = f β) : δ := Quotient.liftOn o (fun w ↦ @f w.α (linearOrderOfSTO w.r) w.wo.toIsWellFounded) fun w₁ w₂ h ↦ @c w₁.α (linearOrderOfSTO w₁.r) w₁.wo.toIsWellFounded w₂.α (linearOrderOfSTO w₂.r) w₂.wo.toIsWellFounded (Quotient.sound h) @[simp] theorem liftOnWellOrder_type {δ : Sort v} (f : ∀ (α) [LinearOrder α] [WellFoundedLT α], δ) (c : ∀ (α) [LinearOrder α] [WellFoundedLT α] (β) [LinearOrder β] [WellFoundedLT β], typeLT α = typeLT β → f α = f β) {γ} [LinearOrder γ] [WellFoundedLT γ] : liftOnWellOrder (typeLT γ) f c = f γ := by change Quotient.liftOn' ⟦_⟧ _ _ = _ rw [Quotient.liftOn'_mk] congr exact LinearOrder.ext_lt fun _ _ ↦ Iff.rfl /-! ### The order on ordinals -/ /-- For `Ordinal`: * less-equal is defined such that well orders `r` and `s` satisfy `type r ≤ type s` if there exists a function embedding `r` as an initial segment of `s`. * less-than is defined such that well orders `r` and `s` satisfy `type r < type s` if there exists a function embedding `r` as a principal segment of `s`. Note that most of the relevant results on initial and principal segments are proved in the `Order.InitialSeg` file. -/ instance partialOrder : PartialOrder Ordinal where le a b := Quotient.liftOn₂ a b (fun ⟨_, r, _⟩ ⟨_, s, _⟩ => Nonempty (r ≼i s)) fun _ _ _ _ ⟨f⟩ ⟨g⟩ => propext ⟨fun ⟨h⟩ => ⟨f.symm.toInitialSeg.trans <\| h.trans g.toInitialSeg⟩, fun ⟨h⟩ => ⟨f.toInitialSeg.trans <\| h.trans g.symm.toInitialSeg⟩⟩ lt a b := Quotient.liftOn₂ a b (fun ⟨_, r, _⟩ ⟨_, s, _⟩ => Nonempty (r ≺i s)) fun _ _ _ _ ⟨f⟩ ⟨g⟩ => propext ⟨fun ⟨h⟩ => ⟨PrincipalSeg.relIsoTrans f.symm <\| h.transRelIso g⟩, fun ⟨h⟩ => ⟨PrincipalSeg.relIsoTrans f <\| h.transRelIso g.symm⟩⟩ le_refl := Quot.ind fun ⟨_, _, _⟩ => ⟨InitialSeg.refl _⟩ le_trans a b c := Quotient.inductionOn₃ a b c fun _ _ _ ⟨f⟩ ⟨g⟩ => ⟨f.trans g⟩ lt_iff_le_not_le a b := Quotient.inductionOn₂ a b fun _ _ => ⟨fun ⟨f⟩ => ⟨⟨f⟩, fun ⟨g⟩ => (f.transInitial g).irrefl⟩, fun ⟨⟨f⟩, h⟩ => f.principalSumRelIso.recOn (fun g => ⟨g⟩) fun g => (h ⟨g.symm.toInitialSeg⟩).elim⟩ le_antisymm a b := Quotient.inductionOn₂ a b fun _ _ ⟨h₁⟩ ⟨h₂⟩ => Quot.sound ⟨InitialSeg.antisymm h₁ h₂⟩ instance : LinearOrder Ordinal := {inferInstanceAs (PartialOrder Ordinal) with le_total := fun a b => Quotient.inductionOn₂ a b fun ⟨_, r, _⟩ ⟨_, s, _⟩ => (InitialSeg.total r s).recOn (fun f => Or.inl ⟨f⟩) fun f => Or.inr ⟨f⟩ toDecidableLE := Classical.decRel _ } theorem _root_.InitialSeg.ordinal_type_le {α β} {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] (h : r ≼i s) : type r ≤ type s := ⟨h⟩ theorem _root_.RelEmbedding.ordinal_type_le {α β} {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] (h : r ↪r s) : type r ≤ type s := ⟨h.collapse⟩ theorem _root_.PrincipalSeg.ordinal_type_lt {α β} {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] (h : r ≺i s) : type r < type s := ⟨h⟩ @[simp] protected theorem zero_le (o : Ordinal) : 0 ≤ o := inductionOn o fun _ r _ => (InitialSeg.ofIsEmpty _ r).ordinal_type_le instance : OrderBot Ordinal where bot := 0 bot_le := Ordinal.zero_le @[simp] theorem bot_eq_zero : (⊥ : Ordinal) = 0 := rfl instance instIsEmptyIioZero : IsEmpty (Iio (0 : Ordinal)) := by simp [← bot_eq_zero] @[simp] protected theorem le_zero {o : Ordinal} : o ≤ 0 ↔ o = 0 := le_bot_iff protected theorem pos_iff_ne_zero {o : Ordinal} : 0 < o ↔ o ≠ 0 := bot_lt_iff_ne_bot protected theorem not_lt_zero (o : Ordinal) : ¬o < 0 := not_lt_bot theorem eq_zero_or_pos : ∀ a : Ordinal, a = 0 ∨ 0 < a := eq_bot_or_bot_lt instance : ZeroLEOneClass Ordinal := ⟨Ordinal.zero_le _⟩ instance instNeZeroOne : NeZero (1 : Ordinal) := ⟨Ordinal.one_ne_zero⟩ theorem type_le_iff {α β} {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] : type r ≤ type s ↔ Nonempty (r ≼i s) := Iff.rfl theorem type_le_iff' {α β} {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] : type r ≤ type s ↔ Nonempty (r ↪r s) := ⟨fun ⟨f⟩ => ⟨f⟩, fun ⟨f⟩ => ⟨f.collapse⟩⟩ theorem type_lt_iff {α β} {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] : type r < type s ↔ Nonempty (r ≺i s) := Iff.rfl /-- Given two ordinals `α ≤ β`, then `initialSegToType α β` is the initial segment embedding of `α.toType` into `β.toType`. -/ def initialSegToType {α β : Ordinal} (h : α ≤ β) : α.toType ≤i β.toType := by apply Classical.choice (type_le_iff.mp _) rwa [type_toType, type_toType] /-- Given two ordinals `α < β`, then `principalSegToType α β` is the principal segment embedding of `α.toType` into `β.toType`. -/ def principalSegToType {α β : Ordinal} (h : α < β) : α.toType <i β.toType := by apply Classical.choice (type_lt_iff.mp _) rwa [type_toType, type_toType] /-! ### Enumerating elements in a well-order with ordinals -/ /-- The order type of an element inside a well order. This is registered as a principal segment embedding into the ordinals, with top `type r`. -/ def typein (r : α → α → Prop) [IsWellOrder α r] : @PrincipalSeg α Ordinal.{u} r (· < ·) := by refine ⟨RelEmbedding.ofMonotone _ fun a b ha ↦ ((PrincipalSeg.ofElement r a).codRestrict _ ?_ ?_).ordinal_type_lt, type r, fun a ↦ ⟨?_, ?_⟩⟩ · rintro ⟨c, hc⟩ exact trans hc ha · exact ha · rintro ⟨b, rfl⟩ exact (PrincipalSeg.ofElement _ _).ordinal_type_lt · refine inductionOn a ?_ rintro β s wo ⟨g⟩ exact ⟨_, g.subrelIso.ordinal_type_eq⟩ @[simp] theorem type_subrel (r : α → α → Prop) [IsWellOrder α r] (a : α) : type (Subrel r (r · a)) = typein r a := rfl @[simp] theorem top_typein (r : α → α → Prop) [IsWellOrder α r] : (typein r).top = type r := rfl theorem typein_lt_type (r : α → α → Prop) [IsWellOrder α r] (a : α) : typein r a < type r := (typein r).lt_top a theorem typein_lt_self {o : Ordinal} (i : o.toType) : typein (α := o.toType) (· < ·) i < o := by simp_rw [← type_toType o] apply typein_lt_type @[simp] theorem typein_top {α β} {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] (f : r ≺i s) : typein s f.top = type r := f.subrelIso.ordinal_type_eq @[simp] theorem typein_lt_typein (r : α → α → Prop) [IsWellOrder α r] {a b : α} : typein r a < typein r b ↔ r a b := (typein r).map_rel_iff @[simp] theorem typein_le_typein (r : α → α → Prop) [IsWellOrder α r] {a b : α} : typein r a ≤ typein r b ↔ ¬r b a := by rw [← not_lt, typein_lt_typein] theorem typein_injective (r : α → α → Prop) [IsWellOrder α r] : Injective (typein r) := (typein r).injective theorem typein_inj (r : α → α → Prop) [IsWellOrder α r] {a b} : typein r a = typein r b ↔ a = b := (typein_injective r).eq_iff theorem mem_range_typein_iff (r : α → α → Prop) [IsWellOrder α r] {o} : o ∈ Set.range (typein r) ↔ o < type r := (typein r).mem_range_iff_rel theorem typein_surj (r : α → α → Prop) [IsWellOrder α r] {o} (h : o < type r) : o ∈ Set.range (typein r) := (typein r).mem_range_of_rel_top h theorem typein_surjOn (r : α → α → Prop) [IsWellOrder α r] : Set.SurjOn (typein r) Set.univ (Set.Iio (type r)) := (typein r).surjOn /-- A well order `r` is order-isomorphic to the set of ordinals smaller than `type r`. `enum r ⟨o, h⟩` is the `o`-th element of `α` ordered by `r`. That is, `enum` maps an initial segment of the ordinals, those less than the order type of `r`, to the elements of `α`. -/ @[simps! symm_apply_coe] def enum (r : α → α → Prop) [IsWellOrder α r] : (· < · : Iio (type r) → Iio (type r) → Prop) ≃r r := (typein r).subrelIso @[simp] theorem typein_enum (r : α → α → Prop) [IsWellOrder α r] {o} (h : o < type r) : typein r (enum r ⟨o, h⟩) = o := (typein r).apply_subrelIso _ theorem enum_type {α β} {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] (f : s ≺i r) {h : type s < type r} : enum r ⟨type s, h⟩ = f.top := (typein r).injective <\| (typein_enum _ _).trans (typein_top _).symm @[simp] theorem enum_typein (r : α → α → Prop) [IsWellOrder α r] (a : α) : enum r ⟨typein r a, typein_lt_type r a⟩ = a := enum_type (PrincipalSeg.ofElement r a) theorem enum_lt_enum {r : α → α → Prop} [IsWellOrder α r] {o₁ o₂ : Iio (type r)} : r (enum r o₁) (enum r o₂) ↔ o₁ < o₂ := (enum _).map_rel_iff theorem enum_le_enum (r : α → α → Prop) [IsWellOrder α r] {o₁ o₂ : Iio (type r)} : ¬r (enum r o₁) (enum r o₂) ↔ o₂ ≤ o₁ := by rw [enum_lt_enum (r := r), not_lt] -- TODO: generalize to other well-orders @[simp] theorem enum_le_enum' (a : Ordinal) {o₁ o₂ : Iio (type (· < ·))} : enum (· < ·) o₁ ≤ enum (α := a.toType) (· < ·) o₂ ↔ o₁ ≤ o₂ := by rw [← enum_le_enum, not_lt] theorem enum_inj {r : α → α → Prop} [IsWellOrder α r] {o₁ o₂ : Iio (type r)} : enum r o₁ = enum r o₂ ↔ o₁ = o₂ := EmbeddingLike.apply_eq_iff_eq _ theorem enum_zero_le {r : α → α → Prop} [IsWellOrder α r] (h0 : 0 < type r) (a : α) : ¬r a (enum r ⟨0, h0⟩) := by rw [← enum_typein r a, enum_le_enum r] apply Ordinal.zero_le theorem enum_zero_le' {o : Ordinal} (h0 : 0 < o) (a : o.toType) : enum (α := o.toType) (· < ·) ⟨0, type_toType _ ▸ h0⟩ ≤ a := by rw [← not_lt] apply enum_zero_le theorem relIso_enum' {α β : Type u} {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] (f : r ≃r s) (o : Ordinal) : ∀ (hr : o < type r) (hs : o < type s), f (enum r ⟨o, hr⟩) = enum s ⟨o, hs⟩ := by refine inductionOn o ?_; rintro γ t wo ⟨g⟩ ⟨h⟩ rw [enum_type g, enum_type (g.transRelIso f)]; rfl theorem relIso_enum {α β : Type u} {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] (f : r ≃r s) (o : Ordinal) (hr : o < type r) : f (enum r ⟨o, hr⟩) = enum s ⟨o, hr.trans_eq (Quotient.sound ⟨f⟩)⟩ := relIso_enum' _ _ _ _ /-- The order isomorphism between ordinals less than `o` and `o.toType`. -/ @[simps! -isSimp] noncomputable def enumIsoToType (o : Ordinal) : Set.Iio o ≃o o.toType where toFun x := enum (α := o.toType) (· < ·) ⟨x.1, type_toType _ ▸ x.2⟩ invFun x := ⟨typein (α := o.toType) (· < ·) x, typein_lt_self x⟩ left_inv _ := Subtype.ext_val (typein_enum _ _) right_inv _ := enum_typein _ _ map_rel_iff' := enum_le_enum' _ instance small_Iio (o : Ordinal.{u}) : Small.{u} (Iio o) := ⟨_, ⟨(enumIsoToType _).toEquiv⟩⟩ instance small_Iic (o : Ordinal.{u}) : Small.{u} (Iic o) := by rw [← Iio_union_right] infer_instance instance small_Ico (a b : Ordinal.{u}) : Small.{u} (Ico a b) := small_subset Ico_subset_Iio_self instance small_Icc (a b : Ordinal.{u}) : Small.{u} (Icc a b) := small_subset Icc_subset_Iic_self instance small_Ioo (a b : Ordinal.{u}) : Small.{u} (Ioo a b) := small_subset Ioo_subset_Iio_self instance small_Ioc (a b : Ordinal.{u}) : Small.{u} (Ioc a b) := small_subset Ioc_subset_Iic_self /-- `o.toType` is an `OrderBot` whenever `o ≠ 0`. -/ def toTypeOrderBot {o : Ordinal} (ho : o ≠ 0) : OrderBot o.toType where bot := (enum (· < ·)) ⟨0, _⟩ bot_le := enum_zero_le' (by rwa [Ordinal.pos_iff_ne_zero]) /-- `o.toType` is an `OrderBot` whenever `0 < o`. -/ @[deprecated "use toTypeOrderBot" (since := "2025-02-13")] def toTypeOrderBotOfPos {o : Ordinal} (ho : 0 < o) : OrderBot o.toType where bot := (enum (· < ·)) ⟨0, _⟩ bot_le := enum_zero_le' ho theorem enum_zero_eq_bot {o : Ordinal} (ho : 0 < o) : enum (α := o.toType) (· < ·) ⟨0, by rwa [type_toType]⟩ = have H := toTypeOrderBot (o := o) (by rintro rfl; simp at ho) (⊥ : o.toType) := rfl theorem lt_wf : @WellFounded Ordinal (· < ·) := wellFounded_iff_wellFounded_subrel.mpr (·.induction_on fun ⟨_, _, wo⟩ ↦ RelHomClass.wellFounded (enum _) wo.wf) instance wellFoundedRelation : WellFoundedRelation Ordinal := ⟨(· < ·), lt_wf⟩ instance wellFoundedLT : WellFoundedLT Ordinal := ⟨lt_wf⟩ instance : ConditionallyCompleteLinearOrderBot Ordinal := WellFoundedLT.conditionallyCompleteLinearOrderBot _ /-- Reformulation of well founded induction on ordinals as a lemma that works with the `induction` tactic, as in `induction i using Ordinal.induction with \| h i IH => ?_`. -/ theorem induction {p : Ordinal.{u} → Prop} (i : Ordinal.{u}) (h : ∀ j, (∀ k, k < j → p k) → p j) : p i := lt_wf.induction i h theorem typein_apply {α β} {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] (f : r ≼i s) (a : α) : typein s (f a) = typein r a := by rw [← f.transPrincipal_apply _ a, (f.transPrincipal _).eq] /-! ### Cardinality of ordinals -/ /-- The cardinal of an ordinal is the cardinality of any type on which a relation with that order type is defined. -/ def card : Ordinal → Cardinal := Quotient.map WellOrder.α fun _ _ ⟨e⟩ => ⟨e.toEquiv⟩ @[simp] theorem card_type (r : α → α → Prop) [IsWellOrder α r] : card (type r) = #α := rfl @[simp] theorem card_typein {r : α → α → Prop} [IsWellOrder α r] (x : α) : #{ y // r y x } = (typein r x).card := rfl theorem card_le_card {o₁ o₂ : Ordinal} : o₁ ≤ o₂ → card o₁ ≤ card o₂ := inductionOn o₁ fun _ _ _ => inductionOn o₂ fun _ _ _ ⟨⟨⟨f, _⟩, _⟩⟩ => ⟨f⟩ @[simp] theorem card_zero : card 0 = 0 := mk_eq_zero _ @[simp] theorem card_one : card 1 = 1 := mk_eq_one _ /-! ### Lifting ordinals to a higher universe -/ -- Porting note: Needed to add universe hint .{u} below /-- The universe lift operation for ordinals, which embeds `Ordinal.{u}` as a proper initial segment of `Ordinal.{v}` for `v > u`. For the initial segment version, see `liftInitialSeg`. -/ @[pp_with_univ] def lift (o : Ordinal.{v}) : Ordinal.{max v u} := Quotient.liftOn o (fun w => type <\| ULift.down.{u} ⁻¹'o w.r) fun ⟨_, r, _⟩ ⟨_, s, _⟩ ⟨f⟩ => Quot.sound ⟨(RelIso.preimage Equiv.ulift r).trans <\| f.trans (RelIso.preimage Equiv.ulift s).symm⟩ @[simp] theorem type_uLift (r : α → α → Prop) [IsWellOrder α r] : type (ULift.down ⁻¹'o r) = lift.{v} (type r) := rfl theorem _root_.RelIso.ordinal_lift_type_eq {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] (f : r ≃r s) : lift.{v} (type r) = lift.{u} (type s) := ((RelIso.preimage Equiv.ulift r).trans <\| f.trans (RelIso.preimage Equiv.ulift s).symm).ordinal_type_eq @[simp] theorem type_preimage {α β : Type u} (r : α → α → Prop) [IsWellOrder α r] (f : β ≃ α) : type (f ⁻¹'o r) = type r := (RelIso.preimage f r).ordinal_type_eq @[simp] theorem type_lift_preimage (r : α → α → Prop) [IsWellOrder α r] (f : β ≃ α) : lift.{u} (type (f ⁻¹'o r)) = lift.{v} (type r) := (RelIso.preimage f r).ordinal_lift_type_eq /-- `lift.{max u v, u}` equals `lift.{v, u}`. Unfortunately, the simp lemma doesn't seem to work. -/ theorem lift_umax : lift.{max u v, u} = lift.{v, u} := funext fun a => inductionOn a fun _ r _ => Quotient.sound ⟨(RelIso.preimage Equiv.ulift r).trans (RelIso.preimage Equiv.ulift r).symm⟩ /-- An ordinal lifted to a lower or equal universe equals itself. Unfortunately, the simp lemma doesn't work. -/ theorem lift_id' (a : Ordinal) : lift a = a := inductionOn a fun _ r _ => Quotient.sound ⟨RelIso.preimage Equiv.ulift r⟩ /-- An ordinal lifted to the same universe equals itself. -/ @[simp] theorem lift_id : ∀ a, lift.{u, u} a = a := lift_id'.{u, u} /-- An ordinal lifted to the zero universe equals itself. -/ @[simp] theorem lift_uzero (a : Ordinal.{u}) : lift.{0} a = a := lift_id' a theorem lift_type_le {α : Type u} {β : Type v} {r s} [IsWellOrder α r] [IsWellOrder β s] : lift.{max v w} (type r) ≤ lift.{max u w} (type s) ↔ Nonempty (r ≼i s) := by constructor <;> refine fun ⟨f⟩ ↦ ⟨?_⟩ · exact (RelIso.preimage Equiv.ulift r).symm.toInitialSeg.trans (f.trans (RelIso.preimage Equiv.ulift s).toInitialSeg) · exact (RelIso.preimage Equiv.ulift r).toInitialSeg.trans (f.trans (RelIso.preimage Equiv.ulift s).symm.toInitialSeg) theorem lift_type_eq {α : Type u} {β : Type v} {r s} [IsWellOrder α r] [IsWellOrder β s] : lift.{max v w} (type r) = lift.{max u w} (type s) ↔ Nonempty (r ≃r s) := by refine Quotient.eq'.trans ⟨?_, ?_⟩ <;> refine fun ⟨f⟩ ↦ ⟨?_⟩ · exact (RelIso.preimage Equiv.ulift r).symm.trans <\| f.trans (RelIso.preimage Equiv.ulift s) · exact (RelIso.preimage Equiv.ulift r).trans <\| f.trans (RelIso.preimage Equiv.ulift s).symm theorem lift_type_lt {α : Type u} {β : Type v} {r s} [IsWellOrder α r] [IsWellOrder β s] : lift.{max v w} (type r) < lift.{max u w} (type s) ↔ Nonempty (r ≺i s) := by constructor <;> refine fun ⟨f⟩ ↦ ⟨?_⟩ · exact (f.relIsoTrans (RelIso.preimage Equiv.ulift r).symm).transInitial (RelIso.preimage Equiv.ulift s).toInitialSeg · exact (f.relIsoTrans (RelIso.preimage Equiv.ulift r)).transInitial (RelIso.preimage Equiv.ulift s).symm.toInitialSeg @[simp] theorem lift_le {a b : Ordinal} : lift.{u, v} a ≤ lift.{u, v} b ↔ a ≤ b := inductionOn₂ a b fun α r _ β s _ => by rw [← lift_umax] exact lift_type_le.{_,_,u} @[simp] theorem lift_inj {a b : Ordinal} : lift.{u, v} a = lift.{u, v} b ↔ a = b := by simp_rw [le_antisymm_iff, lift_le] @[simp] theorem lift_lt {a b : Ordinal} : lift.{u, v} a < lift.{u, v} b ↔ a < b := by simp_rw [lt_iff_le_not_le, lift_le] @[simp] theorem lift_typein_top {r : α → α → Prop} {s : β → β → Prop} [IsWellOrder α r] [IsWellOrder β s] (f : r ≺i s) : lift.{u} (typein s f.top) = lift (type r) := f.subrelIso.ordinal_lift_type_eq /-- Initial segment version of the lift operation on ordinals, embedding `Ordinal.{u}` in `Ordinal.{v}` as an initial segment when `u ≤ v`. -/ def liftInitialSeg : Ordinal.{v} ≤i Ordinal.{max u v} := by refine ⟨RelEmbedding.ofMonotone lift.{u} (by simp), fun a b ↦ Ordinal.inductionOn₂ a b fun α r _ β s _ h ↦ ?_⟩ rw [RelEmbedding.ofMonotone_coe, ← lift_id'.{max u v} (type s), ← lift_umax.{v, u}, lift_type_lt] at h obtain ⟨f⟩ := h use typein r f.top rw [RelEmbedding.ofMonotone_coe, ← lift_umax, lift_typein_top, lift_id'] @[simp] theorem liftInitialSeg_coe : (liftInitialSeg.{v, u} : Ordinal → Ordinal) = lift.{v, u} := rfl @[simp] theorem lift_lift (a : Ordinal.{u}) : lift.{w} (lift.{v} a) = lift.{max v w} a := (liftInitialSeg.trans liftInitialSeg).eq liftInitialSeg a @[simp] theorem lift_zero : lift 0 = 0 := type_eq_zero_of_empty _ @[simp] theorem lift_one : lift 1 = 1 := type_eq_one_of_unique _ @[simp] theorem lift_card (a) : Cardinal.lift.{u, v} (card a) = card (lift.{u} a) := inductionOn a fun _ _ _ => rfl theorem mem_range_lift_of_le {a : Ordinal.{u}} {b : Ordinal.{max u v}} (h : b ≤ lift.{v} a) : b ∈ Set.range lift.{v} := liftInitialSeg.mem_range_of_le h theorem le_lift_iff {a : Ordinal.{u}} {b : Ordinal.{max u v}} : b ≤ lift.{v} a ↔ ∃ a' ≤ a, lift.{v} a' = b := liftInitialSeg.le_apply_iff theorem lt_lift_iff {a : Ordinal.{u}} {b : Ordinal.{max u v}} : b < lift.{v} a ↔ ∃ a' < a, lift.{v} a' = b := liftInitialSeg.lt_apply_iff /-! ### The first infinite ordinal ω -/ /-- `ω` is the first infinite ordinal, defined as the order type of `ℕ`. -/ def omega0 : Ordinal.{u} := lift (typeLT ℕ) @[inherit_doc] scoped notation "ω" => Ordinal.omega0 /-- Note that the presence of this lemma makes `simp [omega0]` form a loop. -/ @[simp] theorem type_nat_lt : typeLT ℕ = ω := (lift_id _).symm @[simp] theorem card_omega0 : card ω = ℵ₀ := rfl @[simp] theorem lift_omega0 : lift ω = ω := lift_lift _ /-! ### Definition and first properties of addition on ordinals In this paragraph, we introduce the addition on ordinals, and prove just enough properties to deduce that the order on ordinals is total (and therefore well-founded). Further properties of the addition, together with properties of the other operations, are proved in `Mathlib/SetTheory/Ordinal/Arithmetic.lean`. -/ /-- `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`. -/ instance add : Add Ordinal.{u} := ⟨fun o₁ o₂ => Quotient.liftOn₂ o₁ o₂ (fun ⟨_, r, _⟩ ⟨_, s, _⟩ => type (Sum.Lex r s)) fun _ _ _ _ ⟨f⟩ ⟨g⟩ => (RelIso.sumLexCongr f g).ordinal_type_eq⟩ instance addMonoidWithOne : AddMonoidWithOne Ordinal.{u} where add := (· + ·) zero := 0 one := 1 zero_add o := inductionOn o fun α _ _ => Eq.symm <\| Quotient.sound ⟨⟨(emptySum PEmpty α).symm, Sum.lex_inr_inr⟩⟩ add_zero o := inductionOn o fun α _ _ => Eq.symm <\| Quotient.sound ⟨⟨(sumEmpty α PEmpty).symm, Sum.lex_inl_inl⟩⟩ add_assoc o₁ o₂ o₃ := Quotient.inductionOn₃ o₁ o₂ o₃ fun ⟨α, r, _⟩ ⟨β, s, _⟩ ⟨γ, t, _⟩ => Quot.sound ⟨⟨sumAssoc _ _ _, by intros a b rcases a with (⟨a \| a⟩ \| a) <;> rcases b with (⟨b \| b⟩ \| b) <;> simp only [sumAssoc_apply_inl_inl, sumAssoc_apply_inl_inr, sumAssoc_apply_inr, Sum.lex_inl_inl, Sum.lex_inr_inr, Sum.Lex.sep, Sum.lex_inr_inl]⟩⟩ nsmul := nsmulRec @[simp] theorem card_add (o₁ o₂ : Ordinal) : card (o₁ + o₂) = card o₁ + card o₂ := inductionOn o₁ fun _ __ => inductionOn o₂ fun _ _ _ => rfl @[simp] theorem type_sum_lex {α β : Type u} (r : α → α → Prop) (s : β → β → Prop) [IsWellOrder α r] [IsWellOrder β s] : type (Sum.Lex r s) = type r + type s := rfl @[simp] theorem card_nat (n : ℕ) : card.{u} n = n := by induction n <;> [simp; simp only [card_add, card_one, Nat.cast_succ, *]] @[simp] theorem card_ofNat (n : ℕ) [n.AtLeastTwo] : card.{u} ofNat(n) = OfNat.ofNat n := card_nat n instance instAddLeftMono : AddLeftMono Ordinal.{u} where elim c a b := by refine inductionOn₃ a b c fun α r _ β s _ γ t _ ⟨f⟩ ↦ (RelEmbedding.ofMonotone (Sum.recOn · Sum.inl (Sum.inr ∘ f)) ?_).ordinal_type_le simp [f.map_rel_iff] instance instAddRightMono : AddRightMono Ordinal.{u} where elim c a b := by refine inductionOn₃ a b c fun α r _ β s _ γ t _ ⟨f⟩ ↦ (RelEmbedding.ofMonotone (Sum.recOn · (Sum.inl ∘ f) Sum.inr) ?_).ordinal_type_le simp [f.map_rel_iff] theorem le_add_right (a b : Ordinal) : a ≤ a + b := by simpa only [add_zero] using add_le_add_left (Ordinal.zero_le b) a theorem le_add_left (a b : Ordinal) : a ≤ b + a := by simpa only [zero_add] using add_le_add_right (Ordinal.zero_le b) a theorem max_zero_left : ∀ a : Ordinal, max 0 a = a := max_bot_left theorem max_zero_right : ∀ a : Ordinal, max a 0 = a := max_bot_right @[simp] theorem max_eq_zero {a b : Ordinal} : max a b = 0 ↔ a = 0 ∧ b = 0 := max_eq_bot @[simp] theorem sInf_empty : sInf (∅ : Set Ordinal) = 0 := dif_neg Set.not_nonempty_empty /-! ### Successor order properties -/ private theorem succ_le_iff' {a b : Ordinal} : a + 1 ≤ b ↔ a < b := by refine inductionOn₂ a b fun α r _ β s _ ↦ ⟨?_, ?_⟩ <;> rintro ⟨f⟩ · refine ⟨((InitialSeg.leAdd _ _).trans f).toPrincipalSeg fun h ↦ ?_⟩ simpa using h (f (Sum.inr PUnit.unit)) · apply (RelEmbedding.ofMonotone (Sum.recOn · f fun _ ↦ f.top) ?_).ordinal_type_le simpa [f.map_rel_iff] using f.lt_top instance : NoMaxOrder Ordinal := ⟨fun _ => ⟨_, succ_le_iff'.1 le_rfl⟩⟩ instance : SuccOrder Ordinal.{u} := SuccOrder.ofSuccLeIff (fun o => o + 1) succ_le_iff' instance : SuccAddOrder Ordinal := ⟨fun _ => rfl⟩ @[simp] theorem add_one_eq_succ (o : Ordinal) : o + 1 = succ o := rfl @[simp] theorem succ_zero : succ (0 : Ordinal) = 1 := zero_add 1 -- Porting note: Proof used to be rfl @[simp] theorem succ_one : succ (1 : Ordinal) = 2 := by congr; simp only [Nat.unaryCast, zero_add] theorem add_succ (o₁ o₂ : Ordinal) : o₁ + succ o₂ = succ (o₁ + o₂) := (add_assoc _ _ _).symm theorem one_le_iff_ne_zero {o : Ordinal} : 1 ≤ o ↔ o ≠ 0 := by rw [Order.one_le_iff_pos, Ordinal.pos_iff_ne_zero] theorem succ_pos (o : Ordinal) : 0 < succ o := bot_lt_succ o theorem succ_ne_zero (o : Ordinal) : succ o ≠ 0 := ne_of_gt <\| succ_pos o @[simp] theorem lt_one_iff_zero {a : Ordinal} : a < 1 ↔ a = 0 := by simpa using @lt_succ_bot_iff _ _ _ a _ _ theorem le_one_iff {a : Ordinal} : a ≤ 1 ↔ a = 0 ∨ a = 1 := by simpa using @le_succ_bot_iff _ _ _ a _ @[simp] theorem card_succ (o : Ordinal) : card (succ o) = card o + 1 := by simp only [← add_one_eq_succ, card_add, card_one] theorem natCast_succ (n : ℕ) : ↑n.succ = succ (n : Ordinal) := rfl instance uniqueIioOne : Unique (Iio (1 : Ordinal)) where default := ⟨0, zero_lt_one' Ordinal⟩ uniq a := Subtype.ext <\| lt_one_iff_zero.1 a.2 @[simp] theorem Iio_one_default_eq : (default : Iio (1 : Ordinal)) = ⟨0, zero_lt_one' Ordinal⟩ := rfl instance uniqueToTypeOne : Unique (toType 1) where default := enum (α := toType 1) (· < ·) ⟨0, by simp⟩ uniq a := by rw [← enum_typein (α := toType 1) (· < ·) a] congr rw [← lt_one_iff_zero] apply typein_lt_self theorem one_toType_eq (x : toType 1) : x = enum (· < ·) ⟨0, by simp⟩ := Unique.eq_default x /-! ### Extra properties of typein and enum -/ -- TODO: use `enumIsoToType` for lemmas on `toType` rather than `enum` and `typein`. @[simp] theorem typein_one_toType (x : toType 1) : typein (α := toType 1) (· < ·) x = 0 := by rw [one_toType_eq x, typein_enum] theorem typein_le_typein' (o : Ordinal) {x y : o.toType} : typein (α := o.toType) (· < ·) x ≤ typein (α := o.toType) (· < ·) y ↔ x ≤ y := by simp theorem le_enum_succ {o : Ordinal} (a : (succ o).toType) : a ≤ enum (α := (succ o).toType) (· < ·) ⟨o, (type_toType _ ▸ lt_succ o)⟩ := by rw [← enum_typein (α := (succ o).toType) (· < ·) a, enum_le_enum', Subtype.mk_le_mk, ← lt_succ_iff] apply typein_lt_self /-! ### Universal ordinal -/ -- intended to be used with explicit universe parameters /-- `univ.{u v}` is the order type of the ordinals of `Type u` as a member of `Ordinal.{v}` (when `u < v`). It is an inaccessible cardinal. -/ @[pp_with_univ, nolint checkUnivs] def univ : Ordinal.{max (u + 1) v} := lift.{v, u + 1} (typeLT Ordinal) theorem univ_id : univ.{u, u + 1} = typeLT Ordinal := lift_id _ @[simp] theorem lift_univ : lift.{w} univ.{u, v} = univ.{u, max v w} := lift_lift _ theorem univ_umax : univ.{u, max (u + 1) v} = univ.{u, v} := congr_fun lift_umax _ /-- Principal segment version of the lift operation on ordinals, embedding `Ordinal.{u}` in `Ordinal.{v}` as a principal segment when `u < v`. -/ def liftPrincipalSeg : Ordinal.{u} <i Ordinal.{max (u + 1) v} := ⟨↑liftInitialSeg.{max (u + 1) v, u}, univ.{u, v}, by refine fun b => inductionOn b ?_; intro β s _ rw [univ, ← lift_umax]; constructor <;> intro h · obtain ⟨a, e⟩ := h rw [← e] refine inductionOn a ?_ intro α r _ exact lift_type_lt.{u, u + 1, max (u + 1) v}.2 ⟨typein r⟩ · rw [← lift_id (type s)] at h ⊢ obtain ⟨f⟩ := lift_type_lt.{_,_,v}.1 h obtain ⟨f, a, hf⟩ := f exists a revert hf -- Porting note: apply inductionOn does not work, refine does refine inductionOn a ?_ intro α r _ hf refine lift_type_eq.{u, max (u + 1) v, max (u + 1) v}.2 ⟨(RelIso.ofSurjective (RelEmbedding.ofMonotone ?_ ?_) ?_).symm⟩ · exact fun b => enum r ⟨f b, (hf _).1 ⟨_, rfl⟩⟩ · refine fun a b h => (typein_lt_typein r).1 ?_ rw [typein_enum, typein_enum] exact f.map_rel_iff.2 h · intro a' obtain ⟨b, e⟩ := (hf _).2 (typein_lt_type _ a') exists b simp only [RelEmbedding.ofMonotone_coe] simp [e]⟩ @[simp] theorem liftPrincipalSeg_coe : (liftPrincipalSeg.{u, v} : Ordinal → Ordinal) = lift.{max (u + 1) v} := rfl @[simp] theorem liftPrincipalSeg_top : (liftPrincipalSeg.{u, v}).top = univ.{u, v} := rfl theorem liftPrincipalSeg_top' : liftPrincipalSeg.{u, u + 1}.top = typeLT Ordinal := by simp only [liftPrincipalSeg_top, univ_id] end Ordinal /-! ### Representing a cardinal with an ordinal -/ namespace Cardinal open Ordinal @[simp] theorem mk_toType (o : Ordinal) : #o.toType = o.card := (Ordinal.card_type _).symm.trans <\| by rw [Ordinal.type_toType] /-- The ordinal corresponding to a cardinal `c` is the least ordinal whose cardinal is `c`. For the order-embedding version, see `ord.order_embedding`. -/ def ord (c : Cardinal) : Ordinal := let F := fun α : Type u => ⨅ r : { r // IsWellOrder α r }, @type α r.1 r.2 Quot.liftOn c F (by suffices ∀ {α β}, α ≈ β → F α ≤ F β from fun α β h => (this h).antisymm (this (Setoid.symm h)) rintro α β ⟨f⟩ refine le_ciInf_iff'.2 fun i => ?_ haveI := @RelEmbedding.isWellOrder _ _ (f ⁻¹'o i.1) _ (↑(RelIso.preimage f i.1)) i.2 exact (ciInf_le' _ (Subtype.mk (f ⁻¹'o i.val) (@RelEmbedding.isWellOrder _ _ _ _ (↑(RelIso.preimage f i.1)) i.2))).trans_eq (Quot.sound ⟨RelIso.preimage f i.1⟩)) theorem ord_eq_Inf (α : Type u) : ord #α = ⨅ r : { r // IsWellOrder α r }, @type α r.1 r.2 := rfl theorem ord_eq (α) : ∃ (r : α → α → Prop) (wo : IsWellOrder α r), ord #α = @type α r wo := let ⟨r, wo⟩ := ciInf_mem fun r : { r // IsWellOrder α r } => @type α r.1 r.2 ⟨r.1, r.2, wo.symm⟩ theorem ord_le_type (r : α → α → Prop) [h : IsWellOrder α r] : ord #α ≤ type r := ciInf_le' _ (Subtype.mk r h) theorem ord_le {c o} : ord c ≤ o ↔ c ≤ o.card := inductionOn c fun α => Ordinal.inductionOn o fun β s _ => by let ⟨r, _, e⟩ := ord_eq α simp only [card_type]; constructor <;> intro h · rw [e] at h exact let ⟨f⟩ := h ⟨f.toEmbedding⟩ · obtain ⟨f⟩ := h have g := RelEmbedding.preimage f s haveI := RelEmbedding.isWellOrder g exact le_trans (ord_le_type _) g.ordinal_type_le theorem gc_ord_card : GaloisConnection ord card := fun _ _ => ord_le theorem lt_ord {c o} : o < ord c ↔ o.card < c := gc_ord_card.lt_iff_lt @[simp] theorem card_ord (c) : (ord c).card = c := c.inductionOn fun α ↦ let ⟨r, _, e⟩ := ord_eq α; e ▸ card_type r theorem card_surjective : Function.Surjective card := fun c ↦ ⟨_, card_ord c⟩ /-- Galois coinsertion between `Cardinal.ord` and `Ordinal.card`. -/ def gciOrdCard : GaloisCoinsertion ord card := gc_ord_card.toGaloisCoinsertion fun c => c.card_ord.le theorem ord_card_le (o : Ordinal) : o.card.ord ≤ o := gc_ord_card.l_u_le _ theorem lt_ord_succ_card (o : Ordinal) : o < (succ o.card).ord := lt_ord.2 <\| lt_succ _ theorem card_le_iff {o : Ordinal} {c : Cardinal} : o.card ≤ c ↔ o < (succ c).ord := by rw [lt_ord, lt_succ_iff] /-- A variation on `Cardinal.lt_ord` using `≤`: If `o` is no greater than the initial ordinal of cardinality `c`, then its cardinal is no greater than `c`. The converse, however, is false (for instance, `o = ω+1` and `c = ℵ₀`). -/ lemma card_le_of_le_ord {o : Ordinal} {c : Cardinal} (ho : o ≤ c.ord) : o.card ≤ c := by rw [← card_ord c]; exact Ordinal.card_le_card ho @[mono] theorem ord_strictMono : StrictMono ord := gciOrdCard.strictMono_l @[mono] theorem ord_mono : Monotone ord := gc_ord_card.monotone_l @[simp] theorem ord_le_ord {c₁ c₂} : ord c₁ ≤ ord c₂ ↔ c₁ ≤ c₂ := gciOrdCard.l_le_l_iff @[simp] theorem ord_lt_ord {c₁ c₂} : ord c₁ < ord c₂ ↔ c₁ < c₂ := ord_strictMono.lt_iff_lt @[simp] theorem ord_zero : ord 0 = 0 := gc_ord_card.l_bot @[simp] theorem ord_nat (n : ℕ) : ord n = n := (ord_le.2 (card_nat n).ge).antisymm (by induction' n with n IH · apply Ordinal.zero_le · exact succ_le_of_lt (IH.trans_lt <\| ord_lt_ord.2 <\| Nat.cast_lt.2 (Nat.lt_succ_self n))) @[simp] theorem ord_one : ord 1 = 1 := by simpa using ord_nat 1 @[simp] theorem ord_ofNat (n : ℕ) [n.AtLeastTwo] : ord ofNat(n) = OfNat.ofNat n := ord_nat n @[simp] theorem ord_aleph0 : ord.{u} ℵ₀ = ω := le_antisymm (ord_le.2 le_rfl) <\| le_of_forall_lt fun o h => by rcases Ordinal.lt_lift_iff.1 h with ⟨o, h', rfl⟩ rw [lt_ord, ← lift_card, lift_lt_aleph0, ← typein_enum (· < ·) h'] exact lt_aleph0_iff_fintype.2 ⟨Set.fintypeLTNat _⟩ @[simp] theorem lift_ord (c) : Ordinal.lift.{u,v} (ord c) = ord (lift.{u,v} c) := by refine le_antisymm (le_of_forall_lt fun a ha => ?_) ?_ · rcases Ordinal.lt_lift_iff.1 ha with ⟨a, _, rfl⟩ rwa [lt_ord, ← lift_card, lift_lt, ← lt_ord, ← Ordinal.lift_lt] · rw [ord_le, ← lift_card, card_ord] theorem mk_ord_toType (c : Cardinal) : #c.ord.toType = c := by simp theorem card_typein_lt (r : α → α → Prop) [IsWellOrder α r] (x : α) (h : ord #α = type r) : card (typein r x) < #α := by rw [← lt_ord, h] apply typein_lt_type theorem card_typein_toType_lt (c : Cardinal) (x : c.ord.toType) : card (typein (α := c.ord.toType) (· < ·) x) < c := by rw [← lt_ord] apply typein_lt_self theorem mk_Iio_ord_toType {c : Cardinal} (i : c.ord.toType) : #(Iio i) < c := card_typein_toType_lt c i theorem ord_injective : Injective ord := by intro c c' h rw [← card_ord c, ← card_ord c', h] @[simp] theorem ord_inj {a b : Cardinal} : a.ord = b.ord ↔ a = b := ord_injective.eq_iff @[simp] theorem ord_eq_zero {a : Cardinal} : a.ord = 0 ↔ a = 0 := ord_injective.eq_iff' ord_zero @[simp] theorem ord_eq_one {a : Cardinal} : a.ord = 1 ↔ a = 1 := ord_injective.eq_iff' ord_one @[simp] theorem omega0_le_ord {a : Cardinal} : ω ≤ a.ord ↔ ℵ₀ ≤ a := by rw [← ord_aleph0, ord_le_ord] @[simp] theorem ord_le_omega0 {a : Cardinal} : a.ord ≤ ω ↔ a ≤ ℵ₀ := by rw [← ord_aleph0, ord_le_ord] @[simp] theorem ord_lt_omega0 {a : Cardinal} : a.ord < ω ↔ a < ℵ₀ := le_iff_le_iff_lt_iff_lt.1 omega0_le_ord @[simp] theorem omega0_lt_ord {a : Cardinal} : ω < a.ord ↔ ℵ₀ < a := le_iff_le_iff_lt_iff_lt.1 ord_le_omega0 @[simp] theorem ord_eq_omega0 {a : Cardinal} : a.ord = ω ↔ a = ℵ₀ := ord_injective.eq_iff' ord_aleph0 /-- The ordinal corresponding to a cardinal `c` is the least ordinal whose cardinal is `c`. This is the order-embedding version. For the regular function, see `ord`. -/ def ord.orderEmbedding : Cardinal ↪o Ordinal := RelEmbedding.orderEmbeddingOfLTEmbedding (RelEmbedding.ofMonotone Cardinal.ord fun _ _ => Cardinal.ord_lt_ord.2) @[simp] theorem ord.orderEmbedding_coe : (ord.orderEmbedding : Cardinal → Ordinal) = ord := rfl -- intended to be used with explicit universe parameters /-- The cardinal `univ` is the cardinality of ordinal `univ`, or equivalently the cardinal of `Ordinal.{u}`, or `Cardinal.{u}`, as an element of `Cardinal.{v}` (when `u < v`). -/ @[pp_with_univ, nolint checkUnivs] def univ := lift.{v, u + 1} #Ordinal theorem univ_id : univ.{u, u + 1} = #Ordinal := lift_id _ @[simp] theorem lift_univ : lift.{w} univ.{u, v} = univ.{u, max v w} := lift_lift _ theorem univ_umax : univ.{u, max (u + 1) v} = univ.{u, v} := congr_fun lift_umax _ theorem lift_lt_univ (c : Cardinal) : lift.{u + 1, u} c < univ.{u, u + 1} := by simpa only [liftPrincipalSeg_coe, lift_ord, lift_succ, ord_le, succ_le_iff] using le_of_lt (liftPrincipalSeg.{u, u + 1}.lt_top (succ c).ord) theorem lift_lt_univ' (c : Cardinal) : lift.{max (u + 1) v, u} c < univ.{u, v} := by have := lift_lt.{_, max (u+1) v}.2 (lift_lt_univ c) rw [lift_lift, lift_univ, univ_umax.{u,v}] at this exact this @[simp] theorem ord_univ : ord univ.{u, v} = Ordinal.univ.{u, v} := by refine le_antisymm (ord_card_le _) <\| le_of_forall_lt fun o h => lt_ord.2 ?_ have := liftPrincipalSeg.mem_range_of_rel_top (by simpa only [liftPrincipalSeg_coe] using h) rcases this with ⟨o, h'⟩ rw [← h', liftPrincipalSeg_coe, ← lift_card] apply lift_lt_univ' theorem lt_univ {c} : c < univ.{u, u + 1} ↔ ∃ c', c = lift.{u + 1, u} c' := ⟨fun h => by have := ord_lt_ord.2 h rw [ord_univ] at this obtain ⟨o, e⟩ := liftPrincipalSeg.mem_range_of_rel_top (by simpa only [liftPrincipalSeg_top]) have := card_ord c rw [← e, liftPrincipalSeg_coe, ← lift_card] at this exact ⟨_, this.symm⟩, fun ⟨_, e⟩ => e.symm ▸ lift_lt_univ _⟩ theorem lt_univ' {c} : c < univ.{u, v} ↔ ∃ c', c = lift.{max (u + 1) v, u} c' := ⟨fun h => by let ⟨a, h', e⟩ := lt_lift_iff.1 h rw [← univ_id] at h' rcases lt_univ.{u}.1 h' with ⟨c', rfl⟩ exact ⟨c', by simp only [e.symm, lift_lift]⟩, fun ⟨_, e⟩ => e.symm ▸ lift_lt_univ' _⟩ theorem small_iff_lift_mk_lt_univ {α : Type u} : Small.{v} α ↔ Cardinal.lift.{v+1,_} #α < univ.{v, max u (v + 1)} := by rw [lt_univ'] constructor · rintro ⟨β, e⟩ exact ⟨#β, lift_mk_eq.{u, _, v + 1}.2 e⟩ · rintro ⟨c, hc⟩ exact ⟨⟨c.out, lift_mk_eq.{u, _, v + 1}.1 (hc.trans (congr rfl c.mk_out.symm))⟩⟩ /-- If a cardinal `c` is non zero, then `c.ord.toType` has a least element. -/ noncomputable def toTypeOrderBot {c : Cardinal} (hc : c ≠ 0) : OrderBot c.ord.toType := Ordinal.toTypeOrderBot (fun h ↦ hc (ord_injective (by simpa using h))) end Cardinal namespace Ordinal @[simp] theorem card_univ : card univ.{u,v} = Cardinal.univ.{u,v} := rfl @[simp] theorem nat_le_card {o} {n : ℕ} : (n : Cardinal) ≤ card o ↔ (n : Ordinal) ≤ o := by rw [← Cardinal.ord_le, Cardinal.ord_nat] @[simp] theorem one_le_card {o} : 1 ≤ card o ↔ 1 ≤ o := by simpa using nat_le_card (n := 1) @[simp] theorem ofNat_le_card {o} {n : ℕ} [n.AtLeastTwo] : (ofNat(n) : Cardinal) ≤ card o ↔ (OfNat.ofNat n : Ordinal) ≤ o := nat_le_card @[simp] theorem aleph0_le_card {o} : ℵ₀ ≤ card o ↔ ω ≤ o := by rw [← ord_le, ord_aleph0] @[simp] theorem card_lt_aleph0 {o} : card o < ℵ₀ ↔ o < ω := le_iff_le_iff_lt_iff_lt.1 aleph0_le_card @[simp] theorem nat_lt_card {o} {n : ℕ} : (n : Cardinal) < card o ↔ (n : Ordinal) < o := by rw [← succ_le_iff, ← succ_le_iff, ← nat_succ, nat_le_card] rfl @[simp] theorem zero_lt_card {o} : 0 < card o ↔ 0 < o := by simpa using nat_lt_card (n := 0) @[simp] theorem one_lt_card {o} : 1 < card o ↔ 1 < o := by simpa using nat_lt_card (n := 1) @[simp] theorem ofNat_lt_card {o} {n : ℕ} [n.AtLeastTwo] : (ofNat(n) : Cardinal) < card o ↔ (OfNat.ofNat n : Ordinal) < o := nat_lt_card @[simp] theorem card_lt_nat {o} {n : ℕ} : card o < n ↔ o < n := lt_iff_lt_of_le_iff_le nat_le_card @[simp] theorem card_lt_ofNat {o} {n : ℕ} [n.AtLeastTwo] : card o < ofNat(n) ↔ o < OfNat.ofNat n := card_lt_nat @[simp] theorem card_le_nat {o} {n : ℕ} : card o ≤ n ↔ o ≤ n := le_iff_le_iff_lt_iff_lt.2 nat_lt_card @[simp] theorem card_le_one {o} : card o ≤ 1 ↔ o ≤ 1 := by simpa using card_le_nat (n := 1) @[simp] theorem card_le_ofNat {o} {n : ℕ} [n.AtLeastTwo] : card o ≤ ofNat(n) ↔ o ≤ OfNat.ofNat n := card_le_nat @[simp] theorem card_eq_nat {o} {n : ℕ} : card o = n ↔ o = n := by simp only [le_antisymm_iff, card_le_nat, nat_le_card] @[simp] theorem card_eq_zero {o} : card o = 0 ↔ o = 0 := by simpa using card_eq_nat (n := 0) @[simp] theorem card_eq_one {o} : card o = 1 ↔ o = 1 := by simpa using card_eq_nat (n := 1) theorem mem_range_lift_of_card_le {a : Cardinal.{u}} {b : Ordinal.{max u v}} (h : card b ≤ Cardinal.lift.{v, u} a) : b ∈ Set.range lift.{v, u} := by rw [card_le_iff, ← lift_succ, ← lift_ord] at h exact mem_range_lift_of_le h.le @[simp] theorem card_eq_ofNat {o} {n : ℕ} [n.AtLeastTwo] : card o = ofNat(n) ↔ o = OfNat.ofNat n := card_eq_nat @[simp] theorem type_fintype (r : α → α → Prop) [IsWellOrder α r] [Fintype α] : type r = Fintype.card α := by rw [← card_eq_nat, card_type, mk_fintype] theorem type_fin (n : ℕ) : typeLT (Fin n) = n := by simp end Ordinal /-! ### Sorted lists -/ theorem List.Sorted.lt_ord_of_lt [LinearOrder α] [WellFoundedLT α] {l m : List α} {o : Ordinal} (hl : l.Sorted (· > ·)) (hm : m.Sorted (· > ·)) (hmltl : m < l) (hlt : ∀ i ∈ l, Ordinal.typein (α := α) (· < ·) i < o) : ∀ i ∈ m, Ordinal.typein (α := α) (· < ·) i < o := by replace hmltl : List.Lex (· < ·) m l := hmltl cases l with \| nil => simp at hmltl \| cons a as => cases m with \| nil => intro i hi; simp at hi \| cons b bs => intro i hi suffices h : i ≤ a by refine lt_of_le_of_lt ?_ (hlt a mem_cons_self); simpa cases hi with \| head as => exact List.head_le_of_lt hmltl \| tail b hi => exact le_of_lt (lt_of_lt_of_le (List.rel_of_sorted_cons hm _ hi) (List.head_le_of_lt hmltl))		Mathlib/SetTheory/Ordinal/Basic.lean	1,627	1,628
/- Copyright (c) 2024 Andrew Yang. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Andrew Yang -/ import Mathlib.LinearAlgebra.Dimension.Constructions import Mathlib.LinearAlgebra.Dimension.Finite import Mathlib.LinearAlgebra.Isomorphisms import Mathlib.Logic.Equiv.Fin.Rotate /-! # The rank nullity theorem In this file we provide the rank nullity theorem as a typeclass, and prove various corollaries of the theorem. The main definition is `HasRankNullity.{u} R`, which states that 1. Every `R`-module `M : Type u` has a linear independent subset of cardinality `Module.rank R M`. 2. `rank (M ⧸ N) + rank N = rank M` for every `R`-module `M : Type u` and every `N : Submodule R M`. The following instances are provided in mathlib: 1. `DivisionRing.hasRankNullity` for division rings in `LinearAlgebra/Dimension/DivisionRing.lean`. 2. `IsDomain.hasRankNullity` for commutative domains in `LinearAlgebra/Dimension/Localization.lean`. TODO: prove the rank-nullity theorem for `[Ring R] [IsDomain R] [StrongRankCondition R]`. See `nonempty_oreSet_of_strongRankCondition` for a start. -/ universe u v open Function Set Cardinal Submodule LinearMap variable {R} {M M₁ M₂ M₃ : Type u} {M' : Type v} [Ring R] variable [AddCommGroup M] [AddCommGroup M₁] [AddCommGroup M₂] [AddCommGroup M₃] [AddCommGroup M'] variable [Module R M] [Module R M₁] [Module R M₂] [Module R M₃] [Module R M'] /-- `HasRankNullity.{u}` is a class of rings satisfying 1. Every `R`-module `M : Type u` has a linear independent subset of cardinality `Module.rank R M`. 2. `rank (M ⧸ N) + rank N = rank M` for every `R`-module `M : Type u` and every `N : Submodule R M`. Usually such a ring satisfies `HasRankNullity.{w}` for all universes `w`, and the universe argument is there because of technical limitations to universe polymorphism. See `DivisionRing.hasRankNullity` and `IsDomain.hasRankNullity`. -/ @[pp_with_univ] class HasRankNullity (R : Type v) [inst : Ring R] : Prop where exists_set_linearIndependent : ∀ (M : Type u) [AddCommGroup M] [Module R M], ∃ s : Set M, #s = Module.rank R M ∧ LinearIndepOn R id s rank_quotient_add_rank : ∀ {M : Type u} [AddCommGroup M] [Module R M] (N : Submodule R M), Module.rank R (M ⧸ N) + Module.rank R N = Module.rank R M variable [HasRankNullity.{u} R] lemma Submodule.rank_quotient_add_rank (N : Submodule R M) : Module.rank R (M ⧸ N) + Module.rank R N = Module.rank R M := HasRankNullity.rank_quotient_add_rank N variable (R M) in lemma exists_set_linearIndependent : ∃ s : Set M, #s = Module.rank R M ∧ LinearIndependent (ι := s) R Subtype.val := HasRankNullity.exists_set_linearIndependent M variable (R) in theorem nontrivial_of_hasRankNullity : Nontrivial R := by refine (subsingleton_or_nontrivial R).resolve_left fun H ↦ ?_ have := rank_quotient_add_rank (R := R) (M := PUnit) ⊥ simp [one_add_one_eq_two] at this attribute [local instance] nontrivial_of_hasRankNullity theorem LinearMap.lift_rank_range_add_rank_ker (f : M →ₗ[R] M') : lift.{u} (Module.rank R (LinearMap.range f)) + lift.{v} (Module.rank R (LinearMap.ker f)) = lift.{v} (Module.rank R M) := by haveI := fun p : Submodule R M => Classical.decEq (M ⧸ p) rw [← f.quotKerEquivRange.lift_rank_eq, ← lift_add, rank_quotient_add_rank] /-- The rank-nullity theorem -/ theorem LinearMap.rank_range_add_rank_ker (f : M →ₗ[R] M₁) : Module.rank R (LinearMap.range f) + Module.rank R (LinearMap.ker f) = Module.rank R M := by haveI := fun p : Submodule R M => Classical.decEq (M ⧸ p) rw [← f.quotKerEquivRange.rank_eq, rank_quotient_add_rank] theorem LinearMap.lift_rank_eq_of_surjective {f : M →ₗ[R] M'} (h : Surjective f) : lift.{v} (Module.rank R M) = lift.{u} (Module.rank R M') + lift.{v} (Module.rank R (LinearMap.ker f)) := by rw [← lift_rank_range_add_rank_ker f, ← rank_range_of_surjective f h] theorem LinearMap.rank_eq_of_surjective {f : M →ₗ[R] M₁} (h : Surjective f) : Module.rank R M = Module.rank R M₁ + Module.rank R (LinearMap.ker f) := by rw [← rank_range_add_rank_ker f, ← rank_range_of_surjective f h] theorem exists_linearIndepOn_of_lt_rank [StrongRankCondition R] {s : Set M} (hs : LinearIndepOn R id s) : ∃ t, s ⊆ t ∧ #t = Module.rank R M ∧ LinearIndepOn R id t := by obtain ⟨t, ht, ht'⟩ := exists_set_linearIndependent R (M ⧸ Submodule.span R s) choose sec hsec using Submodule.mkQ_surjective (Submodule.span R s) have hsec' : (Submodule.mkQ _) ∘ sec = _root_.id := funext hsec have hst : Disjoint s (sec '' t) := by rw [Set.disjoint_iff] rintro _ ⟨hxs, ⟨x, hxt, rfl⟩⟩ apply ht'.ne_zero ⟨x, hxt⟩ rw [Subtype.coe_mk, ← hsec x,mkQ_apply, Quotient.mk_eq_zero] exact Submodule.subset_span hxs refine ⟨s ∪ sec '' t, subset_union_left, ?_, ?_⟩ · rw [Cardinal.mk_union_of_disjoint hst, Cardinal.mk_image_eq, ht, ← rank_quotient_add_rank (Submodule.span R s), add_comm, rank_span_set hs] exact HasLeftInverse.injective ⟨Submodule.Quotient.mk, hsec⟩ · apply LinearIndepOn.union_id_of_quotient Submodule.subset_span hs rwa [linearIndepOn_iff_image (hsec'.symm ▸ injective_id).injOn.image_of_comp, ← image_comp, hsec', image_id] @[deprecated (since := "2025-02-17")] alias exists_linearIndependent_of_lt_rank := exists_linearIndepOn_of_lt_rank /-- Given a family of `n` linearly independent vectors in a space of dimension `> n`, one may extend the family by another vector while retaining linear independence. -/ theorem exists_linearIndependent_cons_of_lt_rank [StrongRankCondition R] {n : ℕ} {v : Fin n → M} (hv : LinearIndependent R v) (h : n < Module.rank R M) : ∃ (x : M), LinearIndependent R (Fin.cons x v) := by obtain ⟨t, h₁, h₂, h₃⟩ := exists_linearIndepOn_of_lt_rank hv.linearIndepOn_id have : range v ≠ t := by refine fun e ↦ h.ne ?_ rw [← e, ← lift_injective.eq_iff, mk_range_eq_of_injective hv.injective] at h₂ simpa only [mk_fintype, Fintype.card_fin, lift_natCast, lift_id'] using h₂ obtain ⟨x, hx, hx'⟩ := nonempty_of_ssubset (h₁.ssubset_of_ne this) exact ⟨x, (linearIndepOn_id_range_iff (Fin.cons_injective_iff.mpr ⟨hx', hv.injective⟩)).mp	(h₃.mono (Fin.range_cons x v ▸ insert_subset hx h₁))⟩ /-- Given a family of `n` linearly independent vectors in a space of dimension `> n`, one may extend the family by another vector while retaining linear independence. -/ theorem exists_linearIndependent_snoc_of_lt_rank [StrongRankCondition R] {n : ℕ} {v : Fin n → M} (hv : LinearIndependent R v) (h : n < Module.rank R M) :	Mathlib/LinearAlgebra/Dimension/RankNullity.lean	127	132
/- Copyright (c) 2020 Damiano Testa. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Damiano Testa -/ import Mathlib.Algebra.Polynomial.Degree.Support import Mathlib.Data.ENat.Basic /-! # Trailing degree of univariate polynomials ## Main definitions * `trailingDegree p`: the multiplicity of `X` in the polynomial `p` * `natTrailingDegree`: a variant of `trailingDegree` that takes values in the natural numbers * `trailingCoeff`: the coefficient at index `natTrailingDegree p` Converts most results about `degree`, `natDegree` and `leadingCoeff` to results about the bottom end of a polynomial -/ noncomputable section open Function Polynomial Finsupp Finset open scoped Polynomial namespace Polynomial universe u v variable {R : Type u} {S : Type v} {a b : R} {n m : ℕ} section Semiring variable [Semiring R] {p q r : R[X]} /-- `trailingDegree p` is the multiplicity of `x` in the polynomial `p`, i.e. the smallest `X`-exponent in `p`. `trailingDegree p = some n` when `p ≠ 0` and `n` is the smallest power of `X` that appears in `p`, otherwise `trailingDegree 0 = ⊤`. -/ def trailingDegree (p : R[X]) : ℕ∞ := p.support.min theorem trailingDegree_lt_wf : WellFounded fun p q : R[X] => trailingDegree p < trailingDegree q := InvImage.wf trailingDegree wellFounded_lt /-- `natTrailingDegree p` forces `trailingDegree p` to `ℕ`, by defining `natTrailingDegree ⊤ = 0`. -/ def natTrailingDegree (p : R[X]) : ℕ := ENat.toNat (trailingDegree p) /-- `trailingCoeff p` gives the coefficient of the smallest power of `X` in `p`. -/ def trailingCoeff (p : R[X]) : R := coeff p (natTrailingDegree p) /-- a polynomial is `monic_at` if its trailing coefficient is 1 -/ def TrailingMonic (p : R[X]) := trailingCoeff p = (1 : R) theorem TrailingMonic.def : TrailingMonic p ↔ trailingCoeff p = 1 := Iff.rfl instance TrailingMonic.decidable [DecidableEq R] : Decidable (TrailingMonic p) := inferInstanceAs <\| Decidable (trailingCoeff p = (1 : R)) @[simp] theorem TrailingMonic.trailingCoeff {p : R[X]} (hp : p.TrailingMonic) : trailingCoeff p = 1 := hp @[simp] theorem trailingDegree_zero : trailingDegree (0 : R[X]) = ⊤ := rfl @[simp] theorem trailingCoeff_zero : trailingCoeff (0 : R[X]) = 0 := rfl @[simp] theorem natTrailingDegree_zero : natTrailingDegree (0 : R[X]) = 0 := rfl @[simp] theorem trailingDegree_eq_top : trailingDegree p = ⊤ ↔ p = 0 := ⟨fun h => support_eq_empty.1 (Finset.min_eq_top.1 h), fun h => by simp [h]⟩ theorem trailingDegree_eq_natTrailingDegree (hp : p ≠ 0) : trailingDegree p = (natTrailingDegree p : ℕ∞) := .symm <\| ENat.coe_toNat <\| mt trailingDegree_eq_top.1 hp theorem trailingDegree_eq_iff_natTrailingDegree_eq {p : R[X]} {n : ℕ} (hp : p ≠ 0) : p.trailingDegree = n ↔ p.natTrailingDegree = n := by rw [trailingDegree_eq_natTrailingDegree hp, Nat.cast_inj] theorem trailingDegree_eq_iff_natTrailingDegree_eq_of_pos {p : R[X]} {n : ℕ} (hn : n ≠ 0) : p.trailingDegree = n ↔ p.natTrailingDegree = n := by rw [natTrailingDegree, ENat.toNat_eq_iff hn] theorem natTrailingDegree_eq_of_trailingDegree_eq_some {p : R[X]} {n : ℕ} (h : trailingDegree p = n) : natTrailingDegree p = n := by simp [natTrailingDegree, h] @[simp] theorem natTrailingDegree_le_trailingDegree : ↑(natTrailingDegree p) ≤ trailingDegree p := ENat.coe_toNat_le_self _	theorem natTrailingDegree_eq_of_trailingDegree_eq [Semiring S] {q : S[X]} (h : trailingDegree p = trailingDegree q) : natTrailingDegree p = natTrailingDegree q := by	Mathlib/Algebra/Polynomial/Degree/TrailingDegree.lean	108	110
/- 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.Group.Submonoid.Operations import Mathlib.Data.DFinsupp.Sigma import Mathlib.Data.DFinsupp.Submonoid /-! # Direct sum This file defines the direct sum of abelian groups, indexed by a discrete type. ## Notation `⨁ i, β i` is the n-ary direct sum `DirectSum`. This notation is in the `DirectSum` locale, accessible after `open DirectSum`. ## References * https://en.wikipedia.org/wiki/Direct_sum -/ open Function universe u v w u₁ variable (ι : Type v) (β : ι → Type w) /-- `DirectSum ι β` is the direct sum of a family of additive commutative monoids `β i`. Note: `open DirectSum` will enable the notation `⨁ i, β i` for `DirectSum ι β`. -/ def DirectSum [∀ i, AddCommMonoid (β i)] : Type _ := Π₀ i, β i -- The `AddCommMonoid, Inhabited` instances should be constructed by a deriving handler. -- https://github.com/leanprover-community/mathlib4/issues/380 instance [∀ i, AddCommMonoid (β i)] : Inhabited (DirectSum ι β) := inferInstanceAs (Inhabited (Π₀ i, β i)) instance [∀ i, AddCommMonoid (β i)] : AddCommMonoid (DirectSum ι β) := inferInstanceAs (AddCommMonoid (Π₀ i, β i)) instance [∀ i, AddCommMonoid (β i)] : DFunLike (DirectSum ι β) _ fun i : ι => β i := inferInstanceAs (DFunLike (Π₀ i, β i) _ _) instance [∀ i, AddCommMonoid (β i)] : CoeFun (DirectSum ι β) fun _ => ∀ i : ι, β i := inferInstanceAs (CoeFun (Π₀ i, β i) fun _ => ∀ i : ι, β i) /-- `⨁ i, f i` is notation for `DirectSum _ f` and equals the direct sum of `fun i ↦ f i`. Taking the direct sum over multiple arguments is possible, e.g. `⨁ (i) (j), f i j`. -/ scoped[DirectSum] notation3 "⨁ "(...)", "r:(scoped f => DirectSum _ f) => r -- Porting note: The below recreates some of the lean3 notation, not fully yet -- section -- open Batteries.ExtendedBinder -- syntax (name := bigdirectsum) "⨁ " extBinders ", " term : term -- macro_rules (kind := bigdirectsum) -- \| `(⨁ $_:ident, $y:ident → $z:ident) => `(DirectSum _ (fun $y ↦ $z)) -- \| `(⨁ $x:ident, $p) => `(DirectSum _ (fun $x ↦ $p)) -- \| `(⨁ $_:ident : $t:ident, $p) => `(DirectSum _ (fun $t ↦ $p)) -- \| `(⨁ ($x:ident) ($y:ident), $p) => `(DirectSum _ (fun $x ↦ fun $y ↦ $p)) -- end instance [DecidableEq ι] [∀ i, AddCommMonoid (β i)] [∀ i, DecidableEq (β i)] : DecidableEq (DirectSum ι β) := inferInstanceAs <\| DecidableEq (Π₀ i, β i) namespace DirectSum variable {ι} /-- Coercion from a `DirectSum` to a pi type is an `AddMonoidHom`. -/ def coeFnAddMonoidHom [∀ i, AddCommMonoid (β i)] : (⨁ i, β i) →+ (Π i, β i) where toFun x := x __ := DFinsupp.coeFnAddMonoidHom @[simp] lemma coeFnAddMonoidHom_apply [∀ i, AddCommMonoid (β i)] (v : ⨁ i, β i) : coeFnAddMonoidHom β v = v := rfl section AddCommGroup variable [∀ i, AddCommGroup (β i)] instance : AddCommGroup (DirectSum ι β) := inferInstanceAs (AddCommGroup (Π₀ i, β i)) variable {β} @[simp] theorem sub_apply (g₁ g₂ : ⨁ i, β i) (i : ι) : (g₁ - g₂) i = g₁ i - g₂ i := rfl end AddCommGroup variable [∀ i, AddCommMonoid (β i)] @[ext] theorem ext {x y : DirectSum ι β} (w : ∀ i, x i = y i) : x = y := DFunLike.ext _ _ w @[simp] theorem zero_apply (i : ι) : (0 : ⨁ i, β i) i = 0 := rfl variable {β} @[simp] theorem add_apply (g₁ g₂ : ⨁ i, β i) (i : ι) : (g₁ + g₂) i = g₁ i + g₂ i := rfl section DecidableEq variable [DecidableEq ι] variable (β) /-- `mk β s x` is the element of `⨁ i, β i` that is zero outside `s` and has coefficient `x i` for `i` in `s`. -/ def mk (s : Finset ι) : (∀ i : (↑s : Set ι), β i.1) →+ ⨁ i, β i where toFun := DFinsupp.mk s map_add' _ _ := DFinsupp.mk_add map_zero' := DFinsupp.mk_zero /-- `of i` is the natural inclusion map from `β i` to `⨁ i, β i`. -/ def of (i : ι) : β i →+ ⨁ i, β i := DFinsupp.singleAddHom β i variable {β} @[simp] theorem of_eq_same (i : ι) (x : β i) : (of _ i x) i = x := DFinsupp.single_eq_same theorem of_eq_of_ne (i j : ι) (x : β i) (h : i ≠ j) : (of _ i x) j = 0 := DFinsupp.single_eq_of_ne h lemma of_apply {i : ι} (j : ι) (x : β i) : of β i x j = if h : i = j then Eq.recOn h x else 0 := DFinsupp.single_apply theorem mk_apply_of_mem {s : Finset ι} {f : ∀ i : (↑s : Set ι), β i.val} {n : ι} (hn : n ∈ s) : mk β s f n = f ⟨n, hn⟩ := by dsimp only [Finset.coe_sort_coe, mk, AddMonoidHom.coe_mk, ZeroHom.coe_mk, DFinsupp.mk_apply] rw [dif_pos hn] theorem mk_apply_of_not_mem {s : Finset ι} {f : ∀ i : (↑s : Set ι), β i.val} {n : ι} (hn : n ∉ s) : mk β s f n = 0 := by dsimp only [Finset.coe_sort_coe, mk, AddMonoidHom.coe_mk, ZeroHom.coe_mk, DFinsupp.mk_apply] rw [dif_neg hn] @[simp] theorem support_zero [∀ (i : ι) (x : β i), Decidable (x ≠ 0)] : (0 : ⨁ i, β i).support = ∅ := DFinsupp.support_zero @[simp] theorem support_of [∀ (i : ι) (x : β i), Decidable (x ≠ 0)] (i : ι) (x : β i) (h : x ≠ 0) : (of _ i x).support = {i} := DFinsupp.support_single_ne_zero h theorem support_of_subset [∀ (i : ι) (x : β i), Decidable (x ≠ 0)] {i : ι} {b : β i} : (of _ i b).support ⊆ {i} := DFinsupp.support_single_subset theorem sum_support_of [∀ (i : ι) (x : β i), Decidable (x ≠ 0)] (x : ⨁ i, β i) : (∑ i ∈ x.support, of β i (x i)) = x := DFinsupp.sum_single theorem sum_univ_of [Fintype ι] (x : ⨁ i, β i) : ∑ i ∈ Finset.univ, of β i (x i) = x := by apply DFinsupp.ext (fun i ↦ ?_) rw [DFinsupp.finset_sum_apply] simp [of_apply] theorem mk_injective (s : Finset ι) : Function.Injective (mk β s) := DFinsupp.mk_injective s theorem of_injective (i : ι) : Function.Injective (of β i) := DFinsupp.single_injective @[elab_as_elim] protected theorem induction_on {motive : (⨁ i, β i) → Prop} (x : ⨁ i, β i) (zero : motive 0) (of : ∀ (i : ι) (x : β i), motive (of β i x)) (add : ∀ x y, motive x → motive y → motive (x + y)) : motive x := by apply DFinsupp.induction x zero intro i b f h1 h2 ih solve_by_elim /-- If two additive homomorphisms from `⨁ i, β i` are equal on each `of β i y`, then they are equal. -/ theorem addHom_ext {γ : Type} [AddZeroClass γ] ⦃f g : (⨁ i, β i) →+ γ⦄ (H : ∀ (i : ι) (y : β i), f (of _ i y) = g (of _ i y)) : f = g := DFinsupp.addHom_ext H /-- If two additive homomorphisms from `⨁ i, β i` are equal on each `of β i y`, then they are equal. See note [partially-applied ext lemmas]. -/ @[ext high] theorem addHom_ext' {γ : Type} [AddZeroClass γ] ⦃f g : (⨁ i, β i) →+ γ⦄ (H : ∀ i : ι, f.comp (of _ i) = g.comp (of _ i)) : f = g := addHom_ext fun i => DFunLike.congr_fun <\| H i variable {γ : Type u₁} [AddCommMonoid γ] section ToAddMonoid variable (φ : ∀ i, β i →+ γ) (ψ : (⨁ i, β i) →+ γ) -- Porting note: The elaborator is struggling with `liftAddHom`. Passing it `β` explicitly helps. -- This applies to roughly the remainder of the file. /-- `toAddMonoid φ` is the natural homomorphism from `⨁ i, β i` to `γ` induced by a family `φ` of homomorphisms `β i → γ`. -/ def toAddMonoid : (⨁ i, β i) →+ γ := DFinsupp.liftAddHom (β := β) φ @[simp] theorem toAddMonoid_of (i) (x : β i) : toAddMonoid φ (of β i x) = φ i x := DFinsupp.liftAddHom_apply_single φ i x theorem toAddMonoid.unique (f : ⨁ i, β i) : ψ f = toAddMonoid (fun i => ψ.comp (of β i)) f := by congr -- Porting note (https://github.com/leanprover-community/mathlib4/issues/11041): `ext` applies addHom_ext' here, which isn't what we want. apply DFinsupp.addHom_ext' simp [toAddMonoid, of] lemma toAddMonoid_injective : Injective (toAddMonoid : (∀ i, β i →+ γ) → (⨁ i, β i) →+ γ) := DFinsupp.liftAddHom.injective @[simp] lemma toAddMonoid_inj {f g : ∀ i, β i →+ γ} : toAddMonoid f = toAddMonoid g ↔ f = g := toAddMonoid_injective.eq_iff end ToAddMonoid section FromAddMonoid /-- `fromAddMonoid φ` is the natural homomorphism from `γ` to `⨁ i, β i` induced by a family `φ` of homomorphisms `γ → β i`. Note that this is not an isomorphism. Not every homomorphism `γ →+ ⨁ i, β i` arises in this way. -/ def fromAddMonoid : (⨁ i, γ →+ β i) →+ γ →+ ⨁ i, β i := toAddMonoid fun i => AddMonoidHom.compHom (of β i) @[simp] theorem fromAddMonoid_of (i : ι) (f : γ →+ β i) : fromAddMonoid (of _ i f) = (of _ i).comp f := by rw [fromAddMonoid, toAddMonoid_of] rfl theorem fromAddMonoid_of_apply (i : ι) (f : γ →+ β i) (x : γ) : fromAddMonoid (of _ i f) x = of _ i (f x) := by rw [fromAddMonoid_of, AddMonoidHom.coe_comp, Function.comp] end FromAddMonoid variable (β) -- TODO: generalize this to remove the assumption `S ⊆ T`. /-- `setToSet β S T h` is the natural homomorphism `⨁ (i : S), β i → ⨁ (i : T), β i`, where `h : S ⊆ T`. -/ def setToSet (S T : Set ι) (H : S ⊆ T) : (⨁ i : S, β i) →+ ⨁ i : T, β i := toAddMonoid fun i => of (fun i : Subtype T => β i) ⟨↑i, H i.2⟩ end DecidableEq instance unique [∀ i, Subsingleton (β i)] : Unique (⨁ i, β i) := DFinsupp.unique /-- A direct sum over an empty type is trivial. -/ instance uniqueOfIsEmpty [IsEmpty ι] : Unique (⨁ i, β i) := DFinsupp.uniqueOfIsEmpty /-- The natural equivalence between `⨁ _ : ι, M` and `M` when `Unique ι`. -/ protected def id (M : Type v) (ι : Type* := PUnit) [AddCommMonoid M] [Unique ι] : (⨁ _ : ι, M) ≃+ M := { DirectSum.toAddMonoid fun _ => AddMonoidHom.id M with toFun := DirectSum.toAddMonoid fun _ => AddMonoidHom.id M invFun := of (fun _ => M) default left_inv := fun x => DirectSum.induction_on x (by rw [AddMonoidHom.map_zero, AddMonoidHom.map_zero]) (fun p x => by rw [Unique.default_eq p, toAddMonoid_of]; rfl) fun x y ihx ihy => by rw [AddMonoidHom.map_add, AddMonoidHom.map_add, ihx, ihy] right_inv := fun _ => toAddMonoid_of _ _ _ } section CongrLeft variable {κ : Type} /-- Reindexing terms of a direct sum. -/ def equivCongrLeft (h : ι ≃ κ) : (⨁ i, β i) ≃+ ⨁ k, β (h.symm k) := { DFinsupp.equivCongrLeft h with map_add' := DFinsupp.comapDomain'_add _ h.right_inv} @[simp] theorem equivCongrLeft_apply (h : ι ≃ κ) (f : ⨁ i, β i) (k : κ) : equivCongrLeft h f k = f (h.symm k) := by exact DFinsupp.comapDomain'_apply _ h.right_inv _ _ end CongrLeft section Option variable {α : Option ι → Type w} [∀ i, AddCommMonoid (α i)] /-- Isomorphism obtained by separating the term of index `none` of a direct sum over `Option ι`. -/ @[simps!] noncomputable def addEquivProdDirectSum : (⨁ i, α i) ≃+ α none × ⨁ i, α (some i) := { DFinsupp.equivProdDFinsupp with map_add' := DFinsupp.equivProdDFinsupp_add } end Option section Sigma variable [DecidableEq ι] {α : ι → Type u} {δ : ∀ i, α i → Type w} [∀ i j, AddCommMonoid (δ i j)] /-- The natural map between `⨁ (i : Σ i, α i), δ i.1 i.2` and `⨁ i (j : α i), δ i j`. -/ def sigmaCurry : (⨁ i : Σ _i, _, δ i.1 i.2) →+ ⨁ (i) (j), δ i j where toFun := DFinsupp.sigmaCurry (δ := δ) map_zero' := DFinsupp.sigmaCurry_zero map_add' f g := DFinsupp.sigmaCurry_add f g @[simp] theorem sigmaCurry_apply (f : ⨁ i : Σ _i, _, δ i.1 i.2) (i : ι) (j : α i) : sigmaCurry f i j = f ⟨i, j⟩ := DFinsupp.sigmaCurry_apply (δ := δ) _ i j /-- The natural map between `⨁ i (j : α i), δ i j` and `Π₀ (i : Σ i, α i), δ i.1 i.2`, inverse of `curry`. -/ def sigmaUncurry : (⨁ (i) (j), δ i j) →+ ⨁ i : Σ _i, _, δ i.1 i.2 where toFun := DFinsupp.sigmaUncurry map_zero' := DFinsupp.sigmaUncurry_zero map_add' := DFinsupp.sigmaUncurry_add @[simp] theorem sigmaUncurry_apply (f : ⨁ (i) (j), δ i j) (i : ι) (j : α i) : sigmaUncurry f ⟨i, j⟩ = f i j := DFinsupp.sigmaUncurry_apply f i j /-- The natural map between `⨁ (i : Σ i, α i), δ i.1 i.2` and `⨁ i (j : α i), δ i j`. -/ def sigmaCurryEquiv : (⨁ i : Σ _i, _, δ i.1 i.2) ≃+ ⨁ (i) (j), δ i j := { sigmaCurry, DFinsupp.sigmaCurryEquiv with } end Sigma /-- The canonical embedding from `⨁ i, A i` to `M` where `A` is a collection of `AddSubmonoid M` indexed by `ι`. When `S = Submodule _ M`, this is available as a `LinearMap`, `DirectSum.coe_linearMap`. -/ protected def coeAddMonoidHom {M S : Type} [DecidableEq ι] [AddCommMonoid M] [SetLike S M] [AddSubmonoidClass S M] (A : ι → S) : (⨁ i, A i) →+ M := toAddMonoid fun i => AddSubmonoidClass.subtype (A i) theorem coeAddMonoidHom_eq_dfinsuppSum [DecidableEq ι] {M S : Type} [DecidableEq M] [AddCommMonoid M] [SetLike S M] [AddSubmonoidClass S M] (A : ι → S) (x : DirectSum ι fun i => A i) : DirectSum.coeAddMonoidHom A x = DFinsupp.sum x fun i => (fun x : A i => ↑x) := by simp only [DirectSum.coeAddMonoidHom, toAddMonoid, DFinsupp.liftAddHom, AddEquiv.coe_mk, Equiv.coe_fn_mk] exact DFinsupp.sumAddHom_apply _ x @[deprecated (since := "2025-04-06")] alias coeAddMonoidHom_eq_dfinsupp_sum := coeAddMonoidHom_eq_dfinsuppSum @[simp] theorem coeAddMonoidHom_of {M S : Type} [DecidableEq ι] [AddCommMonoid M] [SetLike S M] [AddSubmonoidClass S M] (A : ι → S) (i : ι) (x : A i) : DirectSum.coeAddMonoidHom A (of (fun i => A i) i x) = x := toAddMonoid_of _ _ _ theorem coe_of_apply {M S : Type} [DecidableEq ι] [AddCommMonoid M] [SetLike S M] [AddSubmonoidClass S M] {A : ι → S} (i j : ι) (x : A i) : (of (fun i ↦ {x // x ∈ A i}) i x j : M) = if i = j then x else 0 := by obtain rfl \| h := Decidable.eq_or_ne i j · rw [DirectSum.of_eq_same, if_pos rfl] · rw [DirectSum.of_eq_of_ne _ _ _ h, if_neg h, ZeroMemClass.coe_zero, ZeroMemClass.coe_zero] /-- The `DirectSum` formed by a collection of additive submonoids (or subgroups, or submodules) of `M` is said to be internal if the canonical map `(⨁ i, A i) →+ M` is bijective. For the alternate statement in terms of independence and spanning, see `DirectSum.subgroup_isInternal_iff_iSupIndep_and_supr_eq_top` and `DirectSum.isInternal_submodule_iff_iSupIndep_and_iSup_eq_top`. -/ def IsInternal {M S : Type} [DecidableEq ι] [AddCommMonoid M] [SetLike S M] [AddSubmonoidClass S M] (A : ι → S) : Prop := Function.Bijective (DirectSum.coeAddMonoidHom A) theorem IsInternal.addSubmonoid_iSup_eq_top {M : Type*} [DecidableEq ι] [AddCommMonoid M] (A : ι → AddSubmonoid M) (h : IsInternal A) : iSup A = ⊤ := by rw [AddSubmonoid.iSup_eq_mrange_dfinsuppSumAddHom, AddMonoidHom.mrange_eq_top] exact Function.Bijective.surjective h	variable {M S : Type*} [AddCommMonoid M] [SetLike S M] [AddSubmonoidClass S M] theorem support_subset [DecidableEq ι] [DecidableEq M] (A : ι → S) (x : DirectSum ι fun i => A i) : (Function.support fun i => (x i : M)) ⊆ ↑(DFinsupp.support x) := by	Mathlib/Algebra/DirectSum/Basic.lean	395	398
/- Copyright (c) 2023 Paul Reichert. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Paul Reichert, Yaël Dillies -/ import Mathlib.Analysis.Normed.Affine.AddTorsorBases /-! # Intrinsic frontier and interior This file defines the intrinsic frontier, interior and closure of a set in a normed additive torsor. These are also known as relative frontier, interior, closure. The intrinsic frontier/interior/closure of a set `s` is the frontier/interior/closure of `s` considered as a set in its affine span. The intrinsic interior is in general greater than the topological interior, the intrinsic frontier in general less than the topological frontier, and the intrinsic closure in cases of interest the same as the topological closure. ## Definitions * `intrinsicInterior`: Intrinsic interior * `intrinsicFrontier`: Intrinsic frontier * `intrinsicClosure`: Intrinsic closure ## Results The main results are: * `AffineIsometry.image_intrinsicInterior`/`AffineIsometry.image_intrinsicFrontier`/ `AffineIsometry.image_intrinsicClosure`: Intrinsic interiors/frontiers/closures commute with taking the image under an affine isometry. * `Set.Nonempty.intrinsicInterior`: The intrinsic interior of a nonempty convex set is nonempty. ## References * Chapter 8 of [Barry Simon, Convexity][simon2011] * Chapter 1 of [Rolf Schneider, Convex Bodies: The Brunn-Minkowski theory][schneider2013]. ## TODO * `IsClosed s → IsExtreme 𝕜 s (intrinsicFrontier 𝕜 s)` * `x ∈ s → y ∈ intrinsicInterior 𝕜 s → openSegment 𝕜 x y ⊆ intrinsicInterior 𝕜 s` -/ open AffineSubspace Set Topology open scoped Pointwise variable {𝕜 V W Q P : Type} section AddTorsor variable (𝕜) [Ring 𝕜] [AddCommGroup V] [Module 𝕜 V] [TopologicalSpace P] [AddTorsor V P] {s t : Set P} {x : P} /-- The intrinsic interior of a set is its interior considered as a set in its affine span. -/ def intrinsicInterior (s : Set P) : Set P := (↑) '' interior ((↑) ⁻¹' s : Set <\| affineSpan 𝕜 s) /-- The intrinsic frontier of a set is its frontier considered as a set in its affine span. -/ def intrinsicFrontier (s : Set P) : Set P := (↑) '' frontier ((↑) ⁻¹' s : Set <\| affineSpan 𝕜 s) /-- The intrinsic closure of a set is its closure considered as a set in its affine span. -/ def intrinsicClosure (s : Set P) : Set P := (↑) '' closure ((↑) ⁻¹' s : Set <\| affineSpan 𝕜 s) variable {𝕜} @[simp] theorem mem_intrinsicInterior : x ∈ intrinsicInterior 𝕜 s ↔ ∃ y, y ∈ interior ((↑) ⁻¹' s : Set <\| affineSpan 𝕜 s) ∧ ↑y = x := mem_image _ _ _ @[simp] theorem mem_intrinsicFrontier : x ∈ intrinsicFrontier 𝕜 s ↔ ∃ y, y ∈ frontier ((↑) ⁻¹' s : Set <\| affineSpan 𝕜 s) ∧ ↑y = x := mem_image _ _ _ @[simp] theorem mem_intrinsicClosure : x ∈ intrinsicClosure 𝕜 s ↔ ∃ y, y ∈ closure ((↑) ⁻¹' s : Set <\| affineSpan 𝕜 s) ∧ ↑y = x := mem_image _ _ _ theorem intrinsicInterior_subset : intrinsicInterior 𝕜 s ⊆ s := image_subset_iff.2 interior_subset theorem intrinsicFrontier_subset (hs : IsClosed s) : intrinsicFrontier 𝕜 s ⊆ s := image_subset_iff.2 (hs.preimage continuous_induced_dom).frontier_subset theorem intrinsicFrontier_subset_intrinsicClosure : intrinsicFrontier 𝕜 s ⊆ intrinsicClosure 𝕜 s := image_subset _ frontier_subset_closure theorem subset_intrinsicClosure : s ⊆ intrinsicClosure 𝕜 s := fun x hx => ⟨⟨x, subset_affineSpan _ _ hx⟩, subset_closure hx, rfl⟩ @[simp] theorem intrinsicInterior_empty : intrinsicInterior 𝕜 (∅ : Set P) = ∅ := by simp [intrinsicInterior] @[simp] theorem intrinsicFrontier_empty : intrinsicFrontier 𝕜 (∅ : Set P) = ∅ := by simp [intrinsicFrontier] @[simp] theorem intrinsicClosure_empty : intrinsicClosure 𝕜 (∅ : Set P) = ∅ := by simp [intrinsicClosure] @[simp] theorem intrinsicClosure_nonempty : (intrinsicClosure 𝕜 s).Nonempty ↔ s.Nonempty := ⟨by simp_rw [nonempty_iff_ne_empty]; rintro h rfl; exact h intrinsicClosure_empty, Nonempty.mono subset_intrinsicClosure⟩ alias ⟨Set.Nonempty.ofIntrinsicClosure, Set.Nonempty.intrinsicClosure⟩ := intrinsicClosure_nonempty @[simp] theorem intrinsicInterior_singleton (x : P) : intrinsicInterior 𝕜 ({x} : Set P) = {x} := by simp only [intrinsicInterior, preimage_coe_affineSpan_singleton, interior_univ, image_univ, Subtype.range_coe_subtype, mem_affineSpan_singleton, setOf_eq_eq_singleton] @[simp] theorem intrinsicFrontier_singleton (x : P) : intrinsicFrontier 𝕜 ({x} : Set P) = ∅ := by rw [intrinsicFrontier, preimage_coe_affineSpan_singleton, frontier_univ, image_empty] @[simp] theorem intrinsicClosure_singleton (x : P) : intrinsicClosure 𝕜 ({x} : Set P) = {x} := by simp only [intrinsicClosure, preimage_coe_affineSpan_singleton, closure_univ, image_univ, Subtype.range_coe_subtype, mem_affineSpan_singleton, setOf_eq_eq_singleton] /-! Note that neither `intrinsicInterior` nor `intrinsicFrontier` is monotone. -/ theorem intrinsicClosure_mono (h : s ⊆ t) : intrinsicClosure 𝕜 s ⊆ intrinsicClosure 𝕜 t := by refine image_subset_iff.2 fun x hx => ?_ refine ⟨Set.inclusion (affineSpan_mono _ h) x, ?_, rfl⟩ refine (continuous_inclusion (affineSpan_mono _ h)).closure_preimage_subset _ (closure_mono ?_ hx) exact fun y hy => h hy theorem interior_subset_intrinsicInterior : interior s ⊆ intrinsicInterior 𝕜 s := fun x hx => ⟨⟨x, subset_affineSpan _ _ <\| interior_subset hx⟩, preimage_interior_subset_interior_preimage continuous_subtype_val hx, rfl⟩ theorem intrinsicClosure_subset_closure : intrinsicClosure 𝕜 s ⊆ closure s := image_subset_iff.2 <\| continuous_subtype_val.closure_preimage_subset _ theorem intrinsicFrontier_subset_frontier : intrinsicFrontier 𝕜 s ⊆ frontier s := image_subset_iff.2 <\| continuous_subtype_val.frontier_preimage_subset _ theorem intrinsicClosure_subset_affineSpan : intrinsicClosure 𝕜 s ⊆ affineSpan 𝕜 s := (image_subset_range _ _).trans Subtype.range_coe.subset @[simp] theorem intrinsicClosure_diff_intrinsicFrontier (s : Set P) : intrinsicClosure 𝕜 s \ intrinsicFrontier 𝕜 s = intrinsicInterior 𝕜 s := (image_diff Subtype.coe_injective _ _).symm.trans <\| by rw [closure_diff_frontier, intrinsicInterior] @[simp] theorem intrinsicClosure_diff_intrinsicInterior (s : Set P) : intrinsicClosure 𝕜 s \ intrinsicInterior 𝕜 s = intrinsicFrontier 𝕜 s := (image_diff Subtype.coe_injective _ _).symm @[simp] theorem intrinsicInterior_union_intrinsicFrontier (s : Set P) : intrinsicInterior 𝕜 s ∪ intrinsicFrontier 𝕜 s = intrinsicClosure 𝕜 s := by simp [intrinsicClosure, intrinsicInterior, intrinsicFrontier, closure_eq_interior_union_frontier, image_union] @[simp] theorem intrinsicFrontier_union_intrinsicInterior (s : Set P) : intrinsicFrontier 𝕜 s ∪ intrinsicInterior 𝕜 s = intrinsicClosure 𝕜 s := by rw [union_comm, intrinsicInterior_union_intrinsicFrontier] theorem isClosed_intrinsicClosure (hs : IsClosed (affineSpan 𝕜 s : Set P)) : IsClosed (intrinsicClosure 𝕜 s) := hs.isClosedEmbedding_subtypeVal.isClosedMap _ isClosed_closure theorem isClosed_intrinsicFrontier (hs : IsClosed (affineSpan 𝕜 s : Set P)) : IsClosed (intrinsicFrontier 𝕜 s) := hs.isClosedEmbedding_subtypeVal.isClosedMap _ isClosed_frontier @[simp] theorem affineSpan_intrinsicClosure (s : Set P) : affineSpan 𝕜 (intrinsicClosure 𝕜 s) = affineSpan 𝕜 s := (affineSpan_le.2 intrinsicClosure_subset_affineSpan).antisymm <\| affineSpan_mono _ subset_intrinsicClosure protected theorem IsClosed.intrinsicClosure (hs : IsClosed ((↑) ⁻¹' s : Set <\| affineSpan 𝕜 s)) : intrinsicClosure 𝕜 s = s := by rw [intrinsicClosure, hs.closure_eq, image_preimage_eq_of_subset] exact (subset_affineSpan _ _).trans Subtype.range_coe.superset @[simp] theorem intrinsicClosure_idem (s : Set P) : intrinsicClosure 𝕜 (intrinsicClosure 𝕜 s) = intrinsicClosure 𝕜 s := by refine IsClosed.intrinsicClosure ?_ set t := affineSpan 𝕜 (intrinsicClosure 𝕜 s) with ht clear_value t obtain rfl := ht.trans (affineSpan_intrinsicClosure _) rw [intrinsicClosure, preimage_image_eq _ Subtype.coe_injective] exact isClosed_closure end AddTorsor namespace AffineIsometry variable [NormedField 𝕜] [SeminormedAddCommGroup V] [SeminormedAddCommGroup W] [NormedSpace 𝕜 V] [NormedSpace 𝕜 W] [MetricSpace P] [PseudoMetricSpace Q] [NormedAddTorsor V P] [NormedAddTorsor W Q] -- Porting note: Removed attribute `local nolint fails_quickly` attribute [local instance] AffineSubspace.toNormedAddTorsor AffineSubspace.nonempty_map @[simp] theorem image_intrinsicInterior (φ : P →ᵃⁱ[𝕜] Q) (s : Set P) : intrinsicInterior 𝕜 (φ '' s) = φ '' intrinsicInterior 𝕜 s := by obtain rfl \| hs := s.eq_empty_or_nonempty · simp only [intrinsicInterior_empty, image_empty] haveI : Nonempty s := hs.to_subtype let f := ((affineSpan 𝕜 s).isometryEquivMap φ).toHomeomorph have : φ.toAffineMap ∘ (↑) ∘ f.symm = (↑) := funext isometryEquivMap.apply_symm_apply rw [intrinsicInterior, intrinsicInterior, ← φ.coe_toAffineMap, ← map_span φ.toAffineMap s, ← this, ← Function.comp_assoc, image_comp, image_comp, f.symm.image_interior, f.image_symm, ← preimage_comp, Function.comp_assoc, f.symm_comp_self, AffineIsometry.coe_toAffineMap, Function.comp_id, preimage_comp, φ.injective.preimage_image] @[simp] theorem image_intrinsicFrontier (φ : P →ᵃⁱ[𝕜] Q) (s : Set P) : intrinsicFrontier 𝕜 (φ '' s) = φ '' intrinsicFrontier 𝕜 s := by obtain rfl \| hs := s.eq_empty_or_nonempty · simp haveI : Nonempty s := hs.to_subtype let f := ((affineSpan 𝕜 s).isometryEquivMap φ).toHomeomorph have : φ.toAffineMap ∘ (↑) ∘ f.symm = (↑) := funext isometryEquivMap.apply_symm_apply rw [intrinsicFrontier, intrinsicFrontier, ← φ.coe_toAffineMap, ← map_span φ.toAffineMap s, ← this, ← Function.comp_assoc, image_comp, image_comp, f.symm.image_frontier, f.image_symm, ← preimage_comp, Function.comp_assoc, f.symm_comp_self, AffineIsometry.coe_toAffineMap, Function.comp_id, preimage_comp, φ.injective.preimage_image] @[simp] theorem image_intrinsicClosure (φ : P →ᵃⁱ[𝕜] Q) (s : Set P) : intrinsicClosure 𝕜 (φ '' s) = φ '' intrinsicClosure 𝕜 s := by obtain rfl \| hs := s.eq_empty_or_nonempty · simp haveI : Nonempty s := hs.to_subtype let f := ((affineSpan 𝕜 s).isometryEquivMap φ).toHomeomorph have : φ.toAffineMap ∘ (↑) ∘ f.symm = (↑) := funext isometryEquivMap.apply_symm_apply rw [intrinsicClosure, intrinsicClosure, ← φ.coe_toAffineMap, ← map_span φ.toAffineMap s, ← this, ← Function.comp_assoc, image_comp, image_comp, f.symm.image_closure, f.image_symm, ← preimage_comp, Function.comp_assoc, f.symm_comp_self, AffineIsometry.coe_toAffineMap, Function.comp_id, preimage_comp, φ.injective.preimage_image] end AffineIsometry section NormedAddTorsor variable (𝕜) [NontriviallyNormedField 𝕜] [CompleteSpace 𝕜] [NormedAddCommGroup V] [NormedSpace 𝕜 V] [FiniteDimensional 𝕜 V] [MetricSpace P] [NormedAddTorsor V P] (s : Set P) @[simp] theorem intrinsicClosure_eq_closure : intrinsicClosure 𝕜 s = closure s := by ext x simp only [mem_closure_iff, mem_intrinsicClosure] refine ⟨?_, fun h => ⟨⟨x, _⟩, ?_, Subtype.coe_mk _ ?_⟩⟩ · rintro ⟨x, h, rfl⟩ t ht hx obtain ⟨z, hz₁, hz₂⟩ := h _ (continuous_induced_dom.isOpen_preimage t ht) hx exact ⟨z, hz₁, hz₂⟩ · rintro _ ⟨t, ht, rfl⟩ hx obtain ⟨y, hyt, hys⟩ := h _ ht hx exact ⟨⟨_, subset_affineSpan 𝕜 s hys⟩, hyt, hys⟩ · by_contra hc obtain ⟨z, hz₁, hz₂⟩ := h _ (affineSpan 𝕜 s).closed_of_finiteDimensional.isOpen_compl hc exact hz₁ (subset_affineSpan 𝕜 s hz₂) variable {𝕜} @[simp] theorem closure_diff_intrinsicInterior (s : Set P) : closure s \ intrinsicInterior 𝕜 s = intrinsicFrontier 𝕜 s := intrinsicClosure_eq_closure 𝕜 s ▸ intrinsicClosure_diff_intrinsicInterior s @[simp] theorem closure_diff_intrinsicFrontier (s : Set P) : closure s \ intrinsicFrontier 𝕜 s = intrinsicInterior 𝕜 s := intrinsicClosure_eq_closure 𝕜 s ▸ intrinsicClosure_diff_intrinsicFrontier s end NormedAddTorsor private theorem aux {α β : Type} [TopologicalSpace α] [TopologicalSpace β] (φ : α ≃ₜ β) (s : Set β) : (interior s).Nonempty ↔ (interior (φ ⁻¹' s)).Nonempty := by rw [← φ.image_symm, ← φ.symm.image_interior, image_nonempty] variable [NormedAddCommGroup V] [NormedSpace ℝ V] [FiniteDimensional ℝ V] {s : Set V} /-- The intrinsic interior of a nonempty convex set is nonempty. -/ protected theorem Set.Nonempty.intrinsicInterior (hscv : Convex ℝ s) (hsne : s.Nonempty) : (intrinsicInterior ℝ s).Nonempty := by haveI := hsne.coe_sort obtain ⟨p, hp⟩ := hsne let p' : _root_.affineSpan ℝ s := ⟨p, subset_affineSpan _ _ hp⟩ rw [intrinsicInterior, image_nonempty, aux (AffineIsometryEquiv.constVSub ℝ p').symm.toHomeomorph, Convex.interior_nonempty_iff_affineSpan_eq_top, AffineIsometryEquiv.coe_toHomeomorph, ← AffineIsometryEquiv.coe_toAffineEquiv, ← comap_span, affineSpan_coe_preimage_eq_top, comap_top] exact hscv.affine_preimage ((_root_.affineSpan ℝ s).subtype.comp (AffineIsometryEquiv.constVSub ℝ p').symm.toAffineEquiv.toAffineMap) theorem intrinsicInterior_nonempty (hs : Convex ℝ s) : (intrinsicInterior ℝ s).Nonempty ↔ s.Nonempty := ⟨by simp_rw [nonempty_iff_ne_empty]; rintro h rfl; exact h intrinsicInterior_empty, Set.Nonempty.intrinsicInterior hs⟩		Mathlib/Analysis/Convex/Intrinsic.lean	333	335
/- Copyright (c) 2021 Andrew Yang. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Andrew Yang -/ import Mathlib.Algebra.Category.Ring.Instances import Mathlib.Algebra.Category.Ring.Limits import Mathlib.CategoryTheory.Limits.Shapes.Pullback.CommSq import Mathlib.CategoryTheory.Limits.Shapes.StrictInitial import Mathlib.RingTheory.TensorProduct.Basic import Mathlib.RingTheory.IsTensorProduct /-! # Constructions of (co)limits in `CommRingCat` In this file we provide the explicit (co)cones for various (co)limits in `CommRingCat`, including * tensor product is the pushout * tensor product over `Z` is the binary coproduct * `Z` is the initial object * `0` is the strict terminal object * cartesian product is the product * arbitrary direct product of a family of rings is the product object (Pi object) * `RingHom.eqLocus` is the equalizer -/ suppress_compilation universe u u' open CategoryTheory Limits TensorProduct namespace CommRingCat section Pushout variable (R A B : Type u) [CommRing R] [CommRing A] [CommRing B] variable [Algebra R A] [Algebra R B] /-- The explicit cocone with tensor products as the fibered product in `CommRingCat`. -/ def pushoutCocone : Limits.PushoutCocone (CommRingCat.ofHom (algebraMap R A)) (CommRingCat.ofHom (algebraMap R B)) := by fapply Limits.PushoutCocone.mk · exact CommRingCat.of (A ⊗[R] B) · exact ofHom <\| Algebra.TensorProduct.includeLeftRingHom (A := A) · exact ofHom <\| Algebra.TensorProduct.includeRight.toRingHom (A := B) · ext r trans algebraMap R (A ⊗[R] B) r · exact Algebra.TensorProduct.includeLeft.commutes (R := R) r · exact (Algebra.TensorProduct.includeRight.commutes (R := R) r).symm @[simp] theorem pushoutCocone_inl : (pushoutCocone R A B).inl = ofHom (Algebra.TensorProduct.includeLeftRingHom (A := A)) := rfl @[simp] theorem pushoutCocone_inr : (pushoutCocone R A B).inr = ofHom (Algebra.TensorProduct.includeRight.toRingHom (A := B)) := rfl @[simp] theorem pushoutCocone_pt : (pushoutCocone R A B).pt = CommRingCat.of (A ⊗[R] B) := rfl /-- Verify that the `pushout_cocone` is indeed the colimit. -/ def pushoutCoconeIsColimit : Limits.IsColimit (pushoutCocone R A B) := Limits.PushoutCocone.isColimitAux' _ fun s => by letI := RingHom.toAlgebra (s.inl.hom.comp (algebraMap R A)) let f' : A →ₐ[R] s.pt := { s.inl.hom with commutes' := fun r => rfl } let g' : B →ₐ[R] s.pt := { s.inr.hom with commutes' := DFunLike.congr_fun <\| congrArg Hom.hom ((s.ι.naturality Limits.WalkingSpan.Hom.snd).trans (s.ι.naturality Limits.WalkingSpan.Hom.fst).symm) } letI : Algebra R (pushoutCocone R A B).pt := show Algebra R (A ⊗[R] B) by infer_instance -- The factor map is a ⊗ b ↦ f(a) * g(b). use ofHom (AlgHom.toRingHom (Algebra.TensorProduct.productMap f' g')) simp only [pushoutCocone_inl, pushoutCocone_inr] constructor · ext x exact Algebra.TensorProduct.productMap_left_apply (A := A) _ _ x constructor · ext x exact Algebra.TensorProduct.productMap_right_apply (B := B) _ _ x intro h eq1 eq2 let h' : A ⊗[R] B →ₐ[R] s.pt := { h.hom with commutes' := fun r => by change h (algebraMap R A r ⊗ₜ[R] 1) = s.inl (algebraMap R A r) rw [← eq1] simp only [pushoutCocone_pt, coe_of, AlgHom.toRingHom_eq_coe] rfl } suffices h' = Algebra.TensorProduct.productMap f' g' by ext x change h' x = Algebra.TensorProduct.productMap f' g' x rw [this] apply Algebra.TensorProduct.ext' intro a b simp only [f', g', ← eq1, pushoutCocone_pt, ← eq2, AlgHom.toRingHom_eq_coe, Algebra.TensorProduct.productMap_apply_tmul, AlgHom.coe_mk] change _ = h (a ⊗ₜ 1) * h (1 ⊗ₜ b) rw [← h.hom.map_mul, Algebra.TensorProduct.tmul_mul_tmul, mul_one, one_mul] rfl lemma isPushout_tensorProduct (R A B : Type u) [CommRing R] [CommRing A] [CommRing B] [Algebra R A] [Algebra R B] : IsPushout (ofHom <\| algebraMap R A) (ofHom <\| algebraMap R B) (ofHom (S := A ⊗[R] B) <\| Algebra.TensorProduct.includeLeftRingHom) (ofHom (S := A ⊗[R] B) <\| Algebra.TensorProduct.includeRight.toRingHom) where w := by ext simp isColimit' := ⟨pushoutCoconeIsColimit R A B⟩ lemma isPushout_of_isPushout (R S A B : Type u) [CommRing R] [CommRing S] [CommRing A] [CommRing B] [Algebra R S] [Algebra S B] [Algebra R A] [Algebra A B] [Algebra R B] [IsScalarTower R A B] [IsScalarTower R S B] [Algebra.IsPushout R S A B] : IsPushout (ofHom (algebraMap R S)) (ofHom (algebraMap R A)) (ofHom (algebraMap S B)) (ofHom (algebraMap A B)) := (isPushout_tensorProduct R S A).of_iso (Iso.refl _) (Iso.refl _) (Iso.refl _) (Algebra.IsPushout.equiv R S A B).toCommRingCatIso (by simp) (by simp) (by ext; simp [Algebra.IsPushout.equiv_tmul]) (by ext; simp [Algebra.IsPushout.equiv_tmul]) end Pushout section BinaryCoproduct variable (A B : CommRingCat.{u}) /-- The tensor product `A ⊗[ℤ] B` forms a cocone for `A` and `B`. -/ @[simps! pt ι] def coproductCocone : BinaryCofan A B := BinaryCofan.mk (ofHom (Algebra.TensorProduct.includeLeft (S := ℤ)).toRingHom : A ⟶ of (A ⊗[ℤ] B)) (ofHom (Algebra.TensorProduct.includeRight (R := ℤ)).toRingHom : B ⟶ of (A ⊗[ℤ] B)) @[simp] theorem coproductCocone_inl : (coproductCocone A B).inl = ofHom (Algebra.TensorProduct.includeLeft (S := ℤ)).toRingHom := rfl @[simp] theorem coproductCocone_inr : (coproductCocone A B).inr = ofHom (Algebra.TensorProduct.includeRight (R := ℤ)).toRingHom := rfl /-- The tensor product `A ⊗[ℤ] B` is a coproduct for `A` and `B`. -/ @[simps] def coproductCoconeIsColimit : IsColimit (coproductCocone A B) where desc (s : BinaryCofan A B) := ofHom (Algebra.TensorProduct.lift s.inl.hom.toIntAlgHom s.inr.hom.toIntAlgHom (fun _ _ => by apply Commute.all)).toRingHom fac (s : BinaryCofan A B) := fun ⟨j⟩ => by cases j <;> ext a <;> simp uniq (s : BinaryCofan A B) := by rintro ⟨m : A ⊗[ℤ] B →+* s.pt⟩ hm apply CommRingCat.hom_ext apply RingHom.toIntAlgHom_injective apply Algebra.TensorProduct.liftEquiv.symm.injective apply Subtype.ext rw [Algebra.TensorProduct.liftEquiv_symm_apply_coe, Prod.mk.injEq] constructor · ext a simp [map_one, mul_one, ←hm (Discrete.mk WalkingPair.left)] · ext b simp [map_one, mul_one, ←hm (Discrete.mk WalkingPair.right)] /-- The limit cone of the tensor product `A ⊗[ℤ] B` in `CommRingCat`. -/	def coproductColimitCocone : Limits.ColimitCocone (pair A B) := ⟨_, coproductCoconeIsColimit A B⟩	Mathlib/Algebra/Category/Ring/Constructions.lean	170	172
/- Copyright (c) 2018 Ellen Arlt. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Ellen Arlt, Blair Shi, Sean Leather, Mario Carneiro, Johan Commelin -/ import Mathlib.Data.Matrix.Basic import Mathlib.Data.Matrix.Composition import Mathlib.Data.Matrix.ConjTranspose /-! # Block Matrices ## Main definitions * `Matrix.fromBlocks`: build a block matrix out of 4 blocks * `Matrix.toBlocks₁₁`, `Matrix.toBlocks₁₂`, `Matrix.toBlocks₂₁`, `Matrix.toBlocks₂₂`: extract each of the four blocks from `Matrix.fromBlocks`. * `Matrix.blockDiagonal`: block diagonal of equally sized blocks. On square blocks, this is a ring homomorphisms, `Matrix.blockDiagonalRingHom`. * `Matrix.blockDiag`: extract the blocks from the diagonal of a block diagonal matrix. * `Matrix.blockDiagonal'`: block diagonal of unequally sized blocks. On square blocks, this is a ring homomorphisms, `Matrix.blockDiagonal'RingHom`. * `Matrix.blockDiag'`: extract the blocks from the diagonal of a block diagonal matrix. -/ variable {l m n o p q : Type} {m' n' p' : o → Type} variable {R : Type} {S : Type} {α : Type} {β : Type} open Matrix namespace Matrix theorem dotProduct_block [Fintype m] [Fintype n] [Mul α] [AddCommMonoid α] (v w : m ⊕ n → α) : v ⬝ᵥ w = v ∘ Sum.inl ⬝ᵥ w ∘ Sum.inl + v ∘ Sum.inr ⬝ᵥ w ∘ Sum.inr := Fintype.sum_sum_type _ section BlockMatrices /-- We can form a single large matrix by flattening smaller 'block' matrices of compatible dimensions. -/ @[pp_nodot] def fromBlocks (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : Matrix (n ⊕ o) (l ⊕ m) α := of <\| Sum.elim (fun i => Sum.elim (A i) (B i)) (fun j => Sum.elim (C j) (D j)) @[simp] theorem fromBlocks_apply₁₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (i : n) (j : l) : fromBlocks A B C D (Sum.inl i) (Sum.inl j) = A i j := rfl @[simp] theorem fromBlocks_apply₁₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (i : n) (j : m) : fromBlocks A B C D (Sum.inl i) (Sum.inr j) = B i j := rfl @[simp] theorem fromBlocks_apply₂₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (i : o) (j : l) : fromBlocks A B C D (Sum.inr i) (Sum.inl j) = C i j := rfl @[simp] theorem fromBlocks_apply₂₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (i : o) (j : m) : fromBlocks A B C D (Sum.inr i) (Sum.inr j) = D i j := rfl /-- Given a matrix whose row and column indexes are sum types, we can extract the corresponding "top left" submatrix. -/ def toBlocks₁₁ (M : Matrix (n ⊕ o) (l ⊕ m) α) : Matrix n l α := of fun i j => M (Sum.inl i) (Sum.inl j) /-- Given a matrix whose row and column indexes are sum types, we can extract the corresponding "top right" submatrix. -/ def toBlocks₁₂ (M : Matrix (n ⊕ o) (l ⊕ m) α) : Matrix n m α := of fun i j => M (Sum.inl i) (Sum.inr j) /-- Given a matrix whose row and column indexes are sum types, we can extract the corresponding "bottom left" submatrix. -/ def toBlocks₂₁ (M : Matrix (n ⊕ o) (l ⊕ m) α) : Matrix o l α := of fun i j => M (Sum.inr i) (Sum.inl j) /-- Given a matrix whose row and column indexes are sum types, we can extract the corresponding "bottom right" submatrix. -/ def toBlocks₂₂ (M : Matrix (n ⊕ o) (l ⊕ m) α) : Matrix o m α := of fun i j => M (Sum.inr i) (Sum.inr j) theorem fromBlocks_toBlocks (M : Matrix (n ⊕ o) (l ⊕ m) α) : fromBlocks M.toBlocks₁₁ M.toBlocks₁₂ M.toBlocks₂₁ M.toBlocks₂₂ = M := by ext i j rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> rfl @[simp] theorem toBlocks_fromBlocks₁₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D).toBlocks₁₁ = A := rfl @[simp] theorem toBlocks_fromBlocks₁₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D).toBlocks₁₂ = B := rfl @[simp] theorem toBlocks_fromBlocks₂₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D).toBlocks₂₁ = C := rfl @[simp] theorem toBlocks_fromBlocks₂₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D).toBlocks₂₂ = D := rfl /-- Two block matrices are equal if their blocks are equal. -/ theorem ext_iff_blocks {A B : Matrix (n ⊕ o) (l ⊕ m) α} : A = B ↔ A.toBlocks₁₁ = B.toBlocks₁₁ ∧ A.toBlocks₁₂ = B.toBlocks₁₂ ∧ A.toBlocks₂₁ = B.toBlocks₂₁ ∧ A.toBlocks₂₂ = B.toBlocks₂₂ := ⟨fun h => h ▸ ⟨rfl, rfl, rfl, rfl⟩, fun ⟨h₁₁, h₁₂, h₂₁, h₂₂⟩ => by rw [← fromBlocks_toBlocks A, ← fromBlocks_toBlocks B, h₁₁, h₁₂, h₂₁, h₂₂]⟩ @[simp] theorem fromBlocks_inj {A : Matrix n l α} {B : Matrix n m α} {C : Matrix o l α} {D : Matrix o m α} {A' : Matrix n l α} {B' : Matrix n m α} {C' : Matrix o l α} {D' : Matrix o m α} : fromBlocks A B C D = fromBlocks A' B' C' D' ↔ A = A' ∧ B = B' ∧ C = C' ∧ D = D' := ext_iff_blocks theorem fromBlocks_map (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (f : α → β) : (fromBlocks A B C D).map f = fromBlocks (A.map f) (B.map f) (C.map f) (D.map f) := by ext i j; rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [fromBlocks] theorem fromBlocks_transpose (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D)ᵀ = fromBlocks Aᵀ Cᵀ Bᵀ Dᵀ := by ext i j rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [fromBlocks] theorem fromBlocks_conjTranspose [Star α] (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D)ᴴ = fromBlocks Aᴴ Cᴴ Bᴴ Dᴴ := by simp only [conjTranspose, fromBlocks_transpose, fromBlocks_map] @[simp] theorem fromBlocks_submatrix_sum_swap_left (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (f : p → l ⊕ m) : (fromBlocks A B C D).submatrix Sum.swap f = (fromBlocks C D A B).submatrix id f := by ext i j cases i <;> dsimp <;> cases f j <;> rfl @[simp] theorem fromBlocks_submatrix_sum_swap_right (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (f : p → n ⊕ o) : (fromBlocks A B C D).submatrix f Sum.swap = (fromBlocks B A D C).submatrix f id := by ext i j cases j <;> dsimp <;> cases f i <;> rfl theorem fromBlocks_submatrix_sum_swap_sum_swap {l m n o α : Type} (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D).submatrix Sum.swap Sum.swap = fromBlocks D C B A := by simp /-- A 2x2 block matrix is block diagonal if the blocks outside of the diagonal vanish -/ def IsTwoBlockDiagonal [Zero α] (A : Matrix (n ⊕ o) (l ⊕ m) α) : Prop := toBlocks₁₂ A = 0 ∧ toBlocks₂₁ A = 0 /-- Let `p` pick out certain rows and `q` pick out certain columns of a matrix `M`. Then `toBlock M p q` is the corresponding block matrix. -/ def toBlock (M : Matrix m n α) (p : m → Prop) (q : n → Prop) : Matrix { a // p a } { a // q a } α := M.submatrix (↑) (↑) @[simp] theorem toBlock_apply (M : Matrix m n α) (p : m → Prop) (q : n → Prop) (i : { a // p a }) (j : { a // q a }) : toBlock M p q i j = M ↑i ↑j := rfl /-- Let `p` pick out certain rows and columns of a square matrix `M`. Then `toSquareBlockProp M p` is the corresponding block matrix. -/ def toSquareBlockProp (M : Matrix m m α) (p : m → Prop) : Matrix { a // p a } { a // p a } α := toBlock M _ _ theorem toSquareBlockProp_def (M : Matrix m m α) (p : m → Prop) : toSquareBlockProp M p = of (fun i j : { a // p a } => M ↑i ↑j) := rfl /-- Let `b` map rows and columns of a square matrix `M` to blocks. Then `toSquareBlock M b k` is the block `k` matrix. -/ def toSquareBlock (M : Matrix m m α) (b : m → β) (k : β) : Matrix { a // b a = k } { a // b a = k } α := toSquareBlockProp M _ theorem toSquareBlock_def (M : Matrix m m α) (b : m → β) (k : β) : toSquareBlock M b k = of (fun i j : { a // b a = k } => M ↑i ↑j) := rfl theorem fromBlocks_smul [SMul R α] (x : R) (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : x • fromBlocks A B C D = fromBlocks (x • A) (x • B) (x • C) (x • D) := by ext i j; rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [fromBlocks] theorem fromBlocks_neg [Neg R] (A : Matrix n l R) (B : Matrix n m R) (C : Matrix o l R) (D : Matrix o m R) : -fromBlocks A B C D = fromBlocks (-A) (-B) (-C) (-D) := by ext i j cases i <;> cases j <;> simp [fromBlocks] @[simp] theorem fromBlocks_zero [Zero α] : fromBlocks (0 : Matrix n l α) 0 0 (0 : Matrix o m α) = 0 := by ext i j rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> rfl theorem fromBlocks_add [Add α] (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (A' : Matrix n l α) (B' : Matrix n m α) (C' : Matrix o l α) (D' : Matrix o m α) : fromBlocks A B C D + fromBlocks A' B' C' D' = fromBlocks (A + A') (B + B') (C + C') (D + D') := by ext i j; rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> rfl theorem fromBlocks_multiply [Fintype l] [Fintype m] [NonUnitalNonAssocSemiring α] (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (A' : Matrix l p α) (B' : Matrix l q α) (C' : Matrix m p α) (D' : Matrix m q α) : fromBlocks A B C D fromBlocks A' B' C' D' = fromBlocks (A * A' + B * C') (A * B' + B * D') (C * A' + D * C') (C * B' + D * D') := by ext i j rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp only [fromBlocks, mul_apply, of_apply, Sum.elim_inr, Fintype.sum_sum_type, Sum.elim_inl, add_apply] theorem fromBlocks_mulVec [Fintype l] [Fintype m] [NonUnitalNonAssocSemiring α] (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (x : l ⊕ m → α) : (fromBlocks A B C D) ᵥ x = Sum.elim (A ᵥ (x ∘ Sum.inl) + B ᵥ (x ∘ Sum.inr)) (C ᵥ (x ∘ Sum.inl) + D ᵥ (x ∘ Sum.inr)) := by ext i cases i <;> simp [mulVec, dotProduct] theorem vecMul_fromBlocks [Fintype n] [Fintype o] [NonUnitalNonAssocSemiring α] (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (x : n ⊕ o → α) : x ᵥ fromBlocks A B C D = Sum.elim ((x ∘ Sum.inl) ᵥ* A + (x ∘ Sum.inr) ᵥ* C) ((x ∘ Sum.inl) ᵥ* B + (x ∘ Sum.inr) ᵥ* D) := by ext i cases i <;> simp [vecMul, dotProduct] variable [DecidableEq l] [DecidableEq m] section Zero variable [Zero α] theorem toBlock_diagonal_self (d : m → α) (p : m → Prop) : Matrix.toBlock (diagonal d) p p = diagonal fun i : Subtype p => d ↑i := by ext i j by_cases h : i = j · simp [h] · simp [One.one, h, Subtype.val_injective.ne h] theorem toBlock_diagonal_disjoint (d : m → α) {p q : m → Prop} (hpq : Disjoint p q) : Matrix.toBlock (diagonal d) p q = 0 := by ext ⟨i, hi⟩ ⟨j, hj⟩ have : i ≠ j := fun heq => hpq.le_bot i ⟨hi, heq.symm ▸ hj⟩ simp [diagonal_apply_ne d this] @[simp] theorem fromBlocks_diagonal (d₁ : l → α) (d₂ : m → α) : fromBlocks (diagonal d₁) 0 0 (diagonal d₂) = diagonal (Sum.elim d₁ d₂) := by ext i j rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [diagonal] @[simp] lemma toBlocks₁₁_diagonal (v : l ⊕ m → α) : toBlocks₁₁ (diagonal v) = diagonal (fun i => v (Sum.inl i)) := by unfold toBlocks₁₁ funext i j simp only [ne_eq, Sum.inl.injEq, of_apply, diagonal_apply] @[simp] lemma toBlocks₂₂_diagonal (v : l ⊕ m → α) : toBlocks₂₂ (diagonal v) = diagonal (fun i => v (Sum.inr i)) := by unfold toBlocks₂₂ funext i j simp only [ne_eq, Sum.inr.injEq, of_apply, diagonal_apply] @[simp] lemma toBlocks₁₂_diagonal (v : l ⊕ m → α) : toBlocks₁₂ (diagonal v) = 0 := rfl @[simp] lemma toBlocks₂₁_diagonal (v : l ⊕ m → α) : toBlocks₂₁ (diagonal v) = 0 := rfl end Zero section HasZeroHasOne variable [Zero α] [One α] @[simp] theorem fromBlocks_one : fromBlocks (1 : Matrix l l α) 0 0 (1 : Matrix m m α) = 1 := by ext i j rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [one_apply] @[simp] theorem toBlock_one_self (p : m → Prop) : Matrix.toBlock (1 : Matrix m m α) p p = 1 := toBlock_diagonal_self _ p theorem toBlock_one_disjoint {p q : m → Prop} (hpq : Disjoint p q) : Matrix.toBlock (1 : Matrix m m α) p q = 0 := toBlock_diagonal_disjoint _ hpq end HasZeroHasOne end BlockMatrices	section BlockDiagonal variable [DecidableEq o] section Zero	Mathlib/Data/Matrix/Block.lean	303	308
/- Copyright (c) 2020 Joseph Myers. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joseph Myers -/ import Mathlib.Algebra.BigOperators.Group.Finset.Indicator import Mathlib.Algebra.Module.BigOperators import Mathlib.LinearAlgebra.AffineSpace.AffineSubspace.Basic import Mathlib.LinearAlgebra.Finsupp.LinearCombination import Mathlib.Tactic.FinCases /-! # Affine combinations of points This file defines affine combinations of points. ## Main definitions * `weightedVSubOfPoint` is a general weighted combination of subtractions with an explicit base point, yielding a vector. * `weightedVSub` uses an arbitrary choice of base point and is intended to be used when the sum of weights is 0, in which case the result is independent of the choice of base point. * `affineCombination` adds the weighted combination to the arbitrary base point, yielding a point rather than a vector, and is intended to be used when the sum of weights is 1, in which case the result is independent of the choice of base point. These definitions are for sums over a `Finset`; versions for a `Fintype` may be obtained using `Finset.univ`, while versions for a `Finsupp` may be obtained using `Finsupp.support`. ## References * https://en.wikipedia.org/wiki/Affine_space -/ noncomputable section open Affine namespace Finset theorem univ_fin2 : (univ : Finset (Fin 2)) = {0, 1} := by ext x fin_cases x <;> simp variable {k : Type} {V : Type} {P : Type} [Ring k] [AddCommGroup V] [Module k V] variable [S : AffineSpace V P] variable {ι : Type} (s : Finset ι) variable {ι₂ : Type} (s₂ : Finset ι₂) /-- A weighted sum of the results of subtracting a base point from the given points, as a linear map on the weights. The main cases of interest are where the sum of the weights is 0, in which case the sum is independent of the choice of base point, and where the sum of the weights is 1, in which case the sum added to the base point is independent of the choice of base point. -/ def weightedVSubOfPoint (p : ι → P) (b : P) : (ι → k) →ₗ[k] V := ∑ i ∈ s, (LinearMap.proj i : (ι → k) →ₗ[k] k).smulRight (p i -ᵥ b) @[simp] theorem weightedVSubOfPoint_apply (w : ι → k) (p : ι → P) (b : P) : s.weightedVSubOfPoint p b w = ∑ i ∈ s, w i • (p i -ᵥ b) := by simp [weightedVSubOfPoint, LinearMap.sum_apply] /-- The value of `weightedVSubOfPoint`, where the given points are equal. -/ @[simp (high)] theorem weightedVSubOfPoint_apply_const (w : ι → k) (p : P) (b : P) : s.weightedVSubOfPoint (fun _ => p) b w = (∑ i ∈ s, w i) • (p -ᵥ b) := by rw [weightedVSubOfPoint_apply, sum_smul] lemma weightedVSubOfPoint_vadd (s : Finset ι) (w : ι → k) (p : ι → P) (b : P) (v : V) : s.weightedVSubOfPoint (v +ᵥ p) b w = s.weightedVSubOfPoint p (-v +ᵥ b) w := by simp [vadd_vsub_assoc, vsub_vadd_eq_vsub_sub, add_comm] lemma weightedVSubOfPoint_smul {G : Type} [Group G] [DistribMulAction G V] [SMulCommClass G k V] (s : Finset ι) (w : ι → k) (p : ι → V) (b : V) (a : G) : s.weightedVSubOfPoint (a • p) b w = a • s.weightedVSubOfPoint p (a⁻¹ • b) w := by simp [smul_sum, smul_sub, smul_comm a (w _)] /-- `weightedVSubOfPoint` gives equal results for two families of weights and two families of points that are equal on `s`. -/ theorem weightedVSubOfPoint_congr {w₁ w₂ : ι → k} (hw : ∀ i ∈ s, w₁ i = w₂ i) {p₁ p₂ : ι → P} (hp : ∀ i ∈ s, p₁ i = p₂ i) (b : P) : s.weightedVSubOfPoint p₁ b w₁ = s.weightedVSubOfPoint p₂ b w₂ := by simp_rw [weightedVSubOfPoint_apply] refine sum_congr rfl fun i hi => ?_ rw [hw i hi, hp i hi] /-- Given a family of points, if we use a member of the family as a base point, the `weightedVSubOfPoint` does not depend on the value of the weights at this point. -/ theorem weightedVSubOfPoint_eq_of_weights_eq (p : ι → P) (j : ι) (w₁ w₂ : ι → k) (hw : ∀ i, i ≠ j → w₁ i = w₂ i) : s.weightedVSubOfPoint p (p j) w₁ = s.weightedVSubOfPoint p (p j) w₂ := by simp only [Finset.weightedVSubOfPoint_apply] congr ext i rcases eq_or_ne i j with h \| h · simp [h] · simp [hw i h] /-- The weighted sum is independent of the base point when the sum of the weights is 0. -/ theorem weightedVSubOfPoint_eq_of_sum_eq_zero (w : ι → k) (p : ι → P) (h : ∑ i ∈ s, w i = 0) (b₁ b₂ : P) : s.weightedVSubOfPoint p b₁ w = s.weightedVSubOfPoint p b₂ w := by apply eq_of_sub_eq_zero rw [weightedVSubOfPoint_apply, weightedVSubOfPoint_apply, ← sum_sub_distrib] conv_lhs => congr · skip · ext rw [← smul_sub, vsub_sub_vsub_cancel_left] rw [← sum_smul, h, zero_smul] /-- The weighted sum, added to the base point, is independent of the base point when the sum of the weights is 1. -/ theorem weightedVSubOfPoint_vadd_eq_of_sum_eq_one (w : ι → k) (p : ι → P) (h : ∑ i ∈ s, w i = 1) (b₁ b₂ : P) : s.weightedVSubOfPoint p b₁ w +ᵥ b₁ = s.weightedVSubOfPoint p b₂ w +ᵥ b₂ := by rw [weightedVSubOfPoint_apply, weightedVSubOfPoint_apply, ← @vsub_eq_zero_iff_eq V, vadd_vsub_assoc, vsub_vadd_eq_vsub_sub, ← add_sub_assoc, add_comm, add_sub_assoc, ← sum_sub_distrib] conv_lhs => congr · skip · congr · skip · ext rw [← smul_sub, vsub_sub_vsub_cancel_left] rw [← sum_smul, h, one_smul, vsub_add_vsub_cancel, vsub_self] /-- The weighted sum is unaffected by removing the base point, if present, from the set of points. -/ @[simp (high)] theorem weightedVSubOfPoint_erase [DecidableEq ι] (w : ι → k) (p : ι → P) (i : ι) : (s.erase i).weightedVSubOfPoint p (p i) w = s.weightedVSubOfPoint p (p i) w := by rw [weightedVSubOfPoint_apply, weightedVSubOfPoint_apply] apply sum_erase rw [vsub_self, smul_zero] /-- The weighted sum is unaffected by adding the base point, whether or not present, to the set of points. -/ @[simp (high)] theorem weightedVSubOfPoint_insert [DecidableEq ι] (w : ι → k) (p : ι → P) (i : ι) : (insert i s).weightedVSubOfPoint p (p i) w = s.weightedVSubOfPoint p (p i) w := by rw [weightedVSubOfPoint_apply, weightedVSubOfPoint_apply] apply sum_insert_zero rw [vsub_self, smul_zero] /-- The weighted sum is unaffected by changing the weights to the corresponding indicator function and adding points to the set. -/ theorem weightedVSubOfPoint_indicator_subset (w : ι → k) (p : ι → P) (b : P) {s₁ s₂ : Finset ι} (h : s₁ ⊆ s₂) : s₁.weightedVSubOfPoint p b w = s₂.weightedVSubOfPoint p b (Set.indicator (↑s₁) w) := by rw [weightedVSubOfPoint_apply, weightedVSubOfPoint_apply] exact Eq.symm <\| sum_indicator_subset_of_eq_zero w (fun i wi => wi • (p i -ᵥ b : V)) h fun i => zero_smul k _ /-- A weighted sum, over the image of an embedding, equals a weighted sum with the same points and weights over the original `Finset`. -/ theorem weightedVSubOfPoint_map (e : ι₂ ↪ ι) (w : ι → k) (p : ι → P) (b : P) : (s₂.map e).weightedVSubOfPoint p b w = s₂.weightedVSubOfPoint (p ∘ e) b (w ∘ e) := by simp_rw [weightedVSubOfPoint_apply] exact Finset.sum_map _ _ _ /-- A weighted sum of pairwise subtractions, expressed as a subtraction of two `weightedVSubOfPoint` expressions. -/ theorem sum_smul_vsub_eq_weightedVSubOfPoint_sub (w : ι → k) (p₁ p₂ : ι → P) (b : P) : (∑ i ∈ s, w i • (p₁ i -ᵥ p₂ i)) = s.weightedVSubOfPoint p₁ b w - s.weightedVSubOfPoint p₂ b w := by simp_rw [weightedVSubOfPoint_apply, ← sum_sub_distrib, ← smul_sub, vsub_sub_vsub_cancel_right] /-- A weighted sum of pairwise subtractions, where the point on the right is constant, expressed as a subtraction involving a `weightedVSubOfPoint` expression. -/ theorem sum_smul_vsub_const_eq_weightedVSubOfPoint_sub (w : ι → k) (p₁ : ι → P) (p₂ b : P) : (∑ i ∈ s, w i • (p₁ i -ᵥ p₂)) = s.weightedVSubOfPoint p₁ b w - (∑ i ∈ s, w i) • (p₂ -ᵥ b) := by rw [sum_smul_vsub_eq_weightedVSubOfPoint_sub, weightedVSubOfPoint_apply_const] /-- A weighted sum of pairwise subtractions, where the point on the left is constant, expressed as a subtraction involving a `weightedVSubOfPoint` expression. -/ theorem sum_smul_const_vsub_eq_sub_weightedVSubOfPoint (w : ι → k) (p₂ : ι → P) (p₁ b : P) : (∑ i ∈ s, w i • (p₁ -ᵥ p₂ i)) = (∑ i ∈ s, w i) • (p₁ -ᵥ b) - s.weightedVSubOfPoint p₂ b w := by rw [sum_smul_vsub_eq_weightedVSubOfPoint_sub, weightedVSubOfPoint_apply_const] /-- A weighted sum may be split into such sums over two subsets. -/ theorem weightedVSubOfPoint_sdiff [DecidableEq ι] {s₂ : Finset ι} (h : s₂ ⊆ s) (w : ι → k) (p : ι → P) (b : P) : (s \ s₂).weightedVSubOfPoint p b w + s₂.weightedVSubOfPoint p b w = s.weightedVSubOfPoint p b w := by simp_rw [weightedVSubOfPoint_apply, sum_sdiff h] /-- A weighted sum may be split into a subtraction of such sums over two subsets. -/ theorem weightedVSubOfPoint_sdiff_sub [DecidableEq ι] {s₂ : Finset ι} (h : s₂ ⊆ s) (w : ι → k) (p : ι → P) (b : P) : (s \ s₂).weightedVSubOfPoint p b w - s₂.weightedVSubOfPoint p b (-w) = s.weightedVSubOfPoint p b w := by rw [map_neg, sub_neg_eq_add, s.weightedVSubOfPoint_sdiff h] /-- A weighted sum over `s.subtype pred` equals one over `{x ∈ s \| pred x}`. -/ theorem weightedVSubOfPoint_subtype_eq_filter (w : ι → k) (p : ι → P) (b : P) (pred : ι → Prop) [DecidablePred pred] : ((s.subtype pred).weightedVSubOfPoint (fun i => p i) b fun i => w i) = {x ∈ s \| pred x}.weightedVSubOfPoint p b w := by rw [weightedVSubOfPoint_apply, weightedVSubOfPoint_apply, ← sum_subtype_eq_sum_filter] /-- A weighted sum over `{x ∈ s \| pred x}` equals one over `s` if all the weights at indices in `s` not satisfying `pred` are zero. -/ theorem weightedVSubOfPoint_filter_of_ne (w : ι → k) (p : ι → P) (b : P) {pred : ι → Prop} [DecidablePred pred] (h : ∀ i ∈ s, w i ≠ 0 → pred i) : {x ∈ s \| pred x}.weightedVSubOfPoint p b w = s.weightedVSubOfPoint p b w := by rw [weightedVSubOfPoint_apply, weightedVSubOfPoint_apply, sum_filter_of_ne] intro i hi hne refine h i hi ?_ intro hw simp [hw] at hne /-- A constant multiplier of the weights in `weightedVSubOfPoint` may be moved outside the sum. -/ theorem weightedVSubOfPoint_const_smul (w : ι → k) (p : ι → P) (b : P) (c : k) : s.weightedVSubOfPoint p b (c • w) = c • s.weightedVSubOfPoint p b w := by simp_rw [weightedVSubOfPoint_apply, smul_sum, Pi.smul_apply, smul_smul, smul_eq_mul] /-- A weighted sum of the results of subtracting a default base point from the given points, as a linear map on the weights. This is intended to be used when the sum of the weights is 0; that condition is specified as a hypothesis on those lemmas that require it. -/ def weightedVSub (p : ι → P) : (ι → k) →ₗ[k] V := s.weightedVSubOfPoint p (Classical.choice S.nonempty) /-- Applying `weightedVSub` with given weights. This is for the case where a result involving a default base point is OK (for example, when that base point will cancel out later); a more typical use case for `weightedVSub` would involve selecting a preferred base point with `weightedVSub_eq_weightedVSubOfPoint_of_sum_eq_zero` and then using `weightedVSubOfPoint_apply`. -/ theorem weightedVSub_apply (w : ι → k) (p : ι → P) : s.weightedVSub p w = ∑ i ∈ s, w i • (p i -ᵥ Classical.choice S.nonempty) := by simp [weightedVSub, LinearMap.sum_apply] /-- `weightedVSub` gives the sum of the results of subtracting any base point, when the sum of the weights is 0. -/ theorem weightedVSub_eq_weightedVSubOfPoint_of_sum_eq_zero (w : ι → k) (p : ι → P) (h : ∑ i ∈ s, w i = 0) (b : P) : s.weightedVSub p w = s.weightedVSubOfPoint p b w := s.weightedVSubOfPoint_eq_of_sum_eq_zero w p h _ _ /-- The value of `weightedVSub`, where the given points are equal and the sum of the weights is 0. -/ @[simp] theorem weightedVSub_apply_const (w : ι → k) (p : P) (h : ∑ i ∈ s, w i = 0) : s.weightedVSub (fun _ => p) w = 0 := by rw [weightedVSub, weightedVSubOfPoint_apply_const, h, zero_smul] /-- The `weightedVSub` for an empty set is 0. -/ @[simp] theorem weightedVSub_empty (w : ι → k) (p : ι → P) : (∅ : Finset ι).weightedVSub p w = (0 : V) := by simp [weightedVSub_apply] lemma weightedVSub_vadd {s : Finset ι} {w : ι → k} (h : ∑ i ∈ s, w i = 0) (p : ι → P) (v : V) : s.weightedVSub (v +ᵥ p) w = s.weightedVSub p w := by rw [weightedVSub, weightedVSubOfPoint_vadd, weightedVSub_eq_weightedVSubOfPoint_of_sum_eq_zero _ _ _ h] lemma weightedVSub_smul {G : Type} [Group G] [DistribMulAction G V] [SMulCommClass G k V] {s : Finset ι} {w : ι → k} (h : ∑ i ∈ s, w i = 0) (p : ι → V) (a : G) : s.weightedVSub (a • p) w = a • s.weightedVSub p w := by rw [weightedVSub, weightedVSubOfPoint_smul, weightedVSub_eq_weightedVSubOfPoint_of_sum_eq_zero _ _ _ h] /-- `weightedVSub` gives equal results for two families of weights and two families of points that are equal on `s`. -/ theorem weightedVSub_congr {w₁ w₂ : ι → k} (hw : ∀ i ∈ s, w₁ i = w₂ i) {p₁ p₂ : ι → P} (hp : ∀ i ∈ s, p₁ i = p₂ i) : s.weightedVSub p₁ w₁ = s.weightedVSub p₂ w₂ := s.weightedVSubOfPoint_congr hw hp _ /-- The weighted sum is unaffected by changing the weights to the corresponding indicator function and adding points to the set. -/ theorem weightedVSub_indicator_subset (w : ι → k) (p : ι → P) {s₁ s₂ : Finset ι} (h : s₁ ⊆ s₂) : s₁.weightedVSub p w = s₂.weightedVSub p (Set.indicator (↑s₁) w) := weightedVSubOfPoint_indicator_subset _ _ _ h /-- A weighted subtraction, over the image of an embedding, equals a weighted subtraction with the same points and weights over the original `Finset`. -/ theorem weightedVSub_map (e : ι₂ ↪ ι) (w : ι → k) (p : ι → P) : (s₂.map e).weightedVSub p w = s₂.weightedVSub (p ∘ e) (w ∘ e) := s₂.weightedVSubOfPoint_map _ _ _ _ /-- A weighted sum of pairwise subtractions, expressed as a subtraction of two `weightedVSub` expressions. -/ theorem sum_smul_vsub_eq_weightedVSub_sub (w : ι → k) (p₁ p₂ : ι → P) : (∑ i ∈ s, w i • (p₁ i -ᵥ p₂ i)) = s.weightedVSub p₁ w - s.weightedVSub p₂ w := s.sum_smul_vsub_eq_weightedVSubOfPoint_sub _ _ _ _ /-- A weighted sum of pairwise subtractions, where the point on the right is constant and the sum of the weights is 0. -/ theorem sum_smul_vsub_const_eq_weightedVSub (w : ι → k) (p₁ : ι → P) (p₂ : P) (h : ∑ i ∈ s, w i = 0) : (∑ i ∈ s, w i • (p₁ i -ᵥ p₂)) = s.weightedVSub p₁ w := by rw [sum_smul_vsub_eq_weightedVSub_sub, s.weightedVSub_apply_const _ _ h, sub_zero] /-- A weighted sum of pairwise subtractions, where the point on the left is constant and the sum of the weights is 0. -/ theorem sum_smul_const_vsub_eq_neg_weightedVSub (w : ι → k) (p₂ : ι → P) (p₁ : P) (h : ∑ i ∈ s, w i = 0) : (∑ i ∈ s, w i • (p₁ -ᵥ p₂ i)) = -s.weightedVSub p₂ w := by rw [sum_smul_vsub_eq_weightedVSub_sub, s.weightedVSub_apply_const _ _ h, zero_sub] /-- A weighted sum may be split into such sums over two subsets. -/ theorem weightedVSub_sdiff [DecidableEq ι] {s₂ : Finset ι} (h : s₂ ⊆ s) (w : ι → k) (p : ι → P) : (s \ s₂).weightedVSub p w + s₂.weightedVSub p w = s.weightedVSub p w := s.weightedVSubOfPoint_sdiff h _ _ _ /-- A weighted sum may be split into a subtraction of such sums over two subsets. -/ theorem weightedVSub_sdiff_sub [DecidableEq ι] {s₂ : Finset ι} (h : s₂ ⊆ s) (w : ι → k) (p : ι → P) : (s \ s₂).weightedVSub p w - s₂.weightedVSub p (-w) = s.weightedVSub p w := s.weightedVSubOfPoint_sdiff_sub h _ _ _ /-- A weighted sum over `s.subtype pred` equals one over `{x ∈ s \| pred x}`. -/ theorem weightedVSub_subtype_eq_filter (w : ι → k) (p : ι → P) (pred : ι → Prop) [DecidablePred pred] : ((s.subtype pred).weightedVSub (fun i => p i) fun i => w i) = {x ∈ s \| pred x}.weightedVSub p w := s.weightedVSubOfPoint_subtype_eq_filter _ _ _ _ /-- A weighted sum over `{x ∈ s \| pred x}` equals one over `s` if all the weights at indices in `s` not satisfying `pred` are zero. -/ theorem weightedVSub_filter_of_ne (w : ι → k) (p : ι → P) {pred : ι → Prop} [DecidablePred pred] (h : ∀ i ∈ s, w i ≠ 0 → pred i) : {x ∈ s \| pred x}.weightedVSub p w = s.weightedVSub p w := s.weightedVSubOfPoint_filter_of_ne _ _ _ h /-- A constant multiplier of the weights in `weightedVSub_of` may be moved outside the sum. -/ theorem weightedVSub_const_smul (w : ι → k) (p : ι → P) (c : k) : s.weightedVSub p (c • w) = c • s.weightedVSub p w := s.weightedVSubOfPoint_const_smul _ _ _ _ instance : AffineSpace (ι → k) (ι → k) := Pi.instAddTorsor variable (k) /-- A weighted sum of the results of subtracting a default base point from the given points, added to that base point, as an affine map on the weights. This is intended to be used when the sum of the weights is 1, in which case it is an affine combination (barycenter) of the points with the given weights; that condition is specified as a hypothesis on those lemmas that require it. -/ def affineCombination (p : ι → P) : (ι → k) →ᵃ[k] P where toFun w := s.weightedVSubOfPoint p (Classical.choice S.nonempty) w +ᵥ Classical.choice S.nonempty linear := s.weightedVSub p map_vadd' w₁ w₂ := by simp_rw [vadd_vadd, weightedVSub, vadd_eq_add, LinearMap.map_add] /-- The linear map corresponding to `affineCombination` is `weightedVSub`. -/ @[simp] theorem affineCombination_linear (p : ι → P) : (s.affineCombination k p).linear = s.weightedVSub p := rfl variable {k} /-- Applying `affineCombination` with given weights. This is for the case where a result involving a default base point is OK (for example, when that base point will cancel out later); a more typical use case for `affineCombination` would involve selecting a preferred base point with `affineCombination_eq_weightedVSubOfPoint_vadd_of_sum_eq_one` and then using `weightedVSubOfPoint_apply`. -/ theorem affineCombination_apply (w : ι → k) (p : ι → P) : (s.affineCombination k p) w = s.weightedVSubOfPoint p (Classical.choice S.nonempty) w +ᵥ Classical.choice S.nonempty := rfl /-- The value of `affineCombination`, where the given points are equal. -/ @[simp] theorem affineCombination_apply_const (w : ι → k) (p : P) (h : ∑ i ∈ s, w i = 1) : s.affineCombination k (fun _ => p) w = p := by rw [affineCombination_apply, s.weightedVSubOfPoint_apply_const, h, one_smul, vsub_vadd] /-- `affineCombination` gives equal results for two families of weights and two families of points that are equal on `s`. -/ theorem affineCombination_congr {w₁ w₂ : ι → k} (hw : ∀ i ∈ s, w₁ i = w₂ i) {p₁ p₂ : ι → P} (hp : ∀ i ∈ s, p₁ i = p₂ i) : s.affineCombination k p₁ w₁ = s.affineCombination k p₂ w₂ := by simp_rw [affineCombination_apply, s.weightedVSubOfPoint_congr hw hp] /-- `affineCombination` gives the sum with any base point, when the sum of the weights is 1. -/ theorem affineCombination_eq_weightedVSubOfPoint_vadd_of_sum_eq_one (w : ι → k) (p : ι → P) (h : ∑ i ∈ s, w i = 1) (b : P) : s.affineCombination k p w = s.weightedVSubOfPoint p b w +ᵥ b := s.weightedVSubOfPoint_vadd_eq_of_sum_eq_one w p h _ _ /-- Adding a `weightedVSub` to an `affineCombination`. -/ theorem weightedVSub_vadd_affineCombination (w₁ w₂ : ι → k) (p : ι → P) : s.weightedVSub p w₁ +ᵥ s.affineCombination k p w₂ = s.affineCombination k p (w₁ + w₂) := by rw [← vadd_eq_add, AffineMap.map_vadd, affineCombination_linear] /-- Subtracting two `affineCombination`s. -/ theorem affineCombination_vsub (w₁ w₂ : ι → k) (p : ι → P) : s.affineCombination k p w₁ -ᵥ s.affineCombination k p w₂ = s.weightedVSub p (w₁ - w₂) := by rw [← AffineMap.linearMap_vsub, affineCombination_linear, vsub_eq_sub] theorem attach_affineCombination_of_injective [DecidableEq P] (s : Finset P) (w : P → k) (f : s → P) (hf : Function.Injective f) : s.attach.affineCombination k f (w ∘ f) = (image f univ).affineCombination k id w := by simp only [affineCombination, weightedVSubOfPoint_apply, id, vadd_right_cancel_iff, Function.comp_apply, AffineMap.coe_mk] let g₁ : s → V := fun i => w (f i) • (f i -ᵥ Classical.choice S.nonempty) let g₂ : P → V := fun i => w i • (i -ᵥ Classical.choice S.nonempty) change univ.sum g₁ = (image f univ).sum g₂ have hgf : g₁ = g₂ ∘ f := by ext simp [g₁, g₂] rw [hgf, sum_image] · simp only [g₁, g₂,Function.comp_apply] · exact fun _ _ _ _ hxy => hf hxy theorem attach_affineCombination_coe (s : Finset P) (w : P → k) : s.attach.affineCombination k ((↑) : s → P) (w ∘ (↑)) = s.affineCombination k id w := by classical rw [attach_affineCombination_of_injective s w ((↑) : s → P) Subtype.coe_injective, univ_eq_attach, attach_image_val] /-- Viewing a module as an affine space modelled on itself, a `weightedVSub` is just a linear combination. -/ @[simp] theorem weightedVSub_eq_linear_combination {ι} (s : Finset ι) {w : ι → k} {p : ι → V} (hw : s.sum w = 0) : s.weightedVSub p w = ∑ i ∈ s, w i • p i := by simp [s.weightedVSub_apply, vsub_eq_sub, smul_sub, ← Finset.sum_smul, hw] /-- Viewing a module as an affine space modelled on itself, affine combinations are just linear combinations. -/ @[simp] theorem affineCombination_eq_linear_combination (s : Finset ι) (p : ι → V) (w : ι → k) (hw : ∑ i ∈ s, w i = 1) : s.affineCombination k p w = ∑ i ∈ s, w i • p i := by simp [s.affineCombination_eq_weightedVSubOfPoint_vadd_of_sum_eq_one w p hw 0] /-- An `affineCombination` equals a point if that point is in the set and has weight 1 and the other points in the set have weight 0. -/ @[simp] theorem affineCombination_of_eq_one_of_eq_zero (w : ι → k) (p : ι → P) {i : ι} (his : i ∈ s) (hwi : w i = 1) (hw0 : ∀ i2 ∈ s, i2 ≠ i → w i2 = 0) : s.affineCombination k p w = p i := by have h1 : ∑ i ∈ s, w i = 1 := hwi ▸ sum_eq_single i hw0 fun h => False.elim (h his) rw [s.affineCombination_eq_weightedVSubOfPoint_vadd_of_sum_eq_one w p h1 (p i), weightedVSubOfPoint_apply] convert zero_vadd V (p i) refine sum_eq_zero ?_ intro i2 hi2 by_cases h : i2 = i · simp [h] · simp [hw0 i2 hi2 h] /-- An affine combination is unaffected by changing the weights to the corresponding indicator function and adding points to the set. -/ theorem affineCombination_indicator_subset (w : ι → k) (p : ι → P) {s₁ s₂ : Finset ι} (h : s₁ ⊆ s₂) : s₁.affineCombination k p w = s₂.affineCombination k p (Set.indicator (↑s₁) w) := by rw [affineCombination_apply, affineCombination_apply, weightedVSubOfPoint_indicator_subset _ _ _ h] /-- An affine combination, over the image of an embedding, equals an affine combination with the same points and weights over the original `Finset`. -/ theorem affineCombination_map (e : ι₂ ↪ ι) (w : ι → k) (p : ι → P) : (s₂.map e).affineCombination k p w = s₂.affineCombination k (p ∘ e) (w ∘ e) := by simp_rw [affineCombination_apply, weightedVSubOfPoint_map] /-- A weighted sum of pairwise subtractions, expressed as a subtraction of two `affineCombination` expressions. -/ theorem sum_smul_vsub_eq_affineCombination_vsub (w : ι → k) (p₁ p₂ : ι → P) : (∑ i ∈ s, w i • (p₁ i -ᵥ p₂ i)) = s.affineCombination k p₁ w -ᵥ s.affineCombination k p₂ w := by simp_rw [affineCombination_apply, vadd_vsub_vadd_cancel_right] exact s.sum_smul_vsub_eq_weightedVSubOfPoint_sub _ _ _ _ /-- A weighted sum of pairwise subtractions, where the point on the right is constant and the sum of the weights is 1. -/ theorem sum_smul_vsub_const_eq_affineCombination_vsub (w : ι → k) (p₁ : ι → P) (p₂ : P) (h : ∑ i ∈ s, w i = 1) : (∑ i ∈ s, w i • (p₁ i -ᵥ p₂)) = s.affineCombination k p₁ w -ᵥ p₂ := by rw [sum_smul_vsub_eq_affineCombination_vsub, affineCombination_apply_const _ _ _ h] /-- A weighted sum of pairwise subtractions, where the point on the left is constant and the sum of the weights is 1. -/ theorem sum_smul_const_vsub_eq_vsub_affineCombination (w : ι → k) (p₂ : ι → P) (p₁ : P) (h : ∑ i ∈ s, w i = 1) : (∑ i ∈ s, w i • (p₁ -ᵥ p₂ i)) = p₁ -ᵥ s.affineCombination k p₂ w := by rw [sum_smul_vsub_eq_affineCombination_vsub, affineCombination_apply_const _ _ _ h] /-- A weighted sum may be split into a subtraction of affine combinations over two subsets. -/ theorem affineCombination_sdiff_sub [DecidableEq ι] {s₂ : Finset ι} (h : s₂ ⊆ s) (w : ι → k) (p : ι → P) : (s \ s₂).affineCombination k p w -ᵥ s₂.affineCombination k p (-w) = s.weightedVSub p w := by simp_rw [affineCombination_apply, vadd_vsub_vadd_cancel_right] exact s.weightedVSub_sdiff_sub h _ _ /-- If a weighted sum is zero and one of the weights is `-1`, the corresponding point is the affine combination of the other points with the given weights. -/ theorem affineCombination_eq_of_weightedVSub_eq_zero_of_eq_neg_one {w : ι → k} {p : ι → P} (hw : s.weightedVSub p w = (0 : V)) {i : ι} [DecidablePred (· ≠ i)] (his : i ∈ s) (hwi : w i = -1) : {x ∈ s \| x ≠ i}.affineCombination k p w = p i := by classical rw [← @vsub_eq_zero_iff_eq V, ← hw, ← s.affineCombination_sdiff_sub (singleton_subset_iff.2 his), sdiff_singleton_eq_erase, ← filter_ne'] congr refine (affineCombination_of_eq_one_of_eq_zero _ _ _ (mem_singleton_self _) ?_ ?_).symm · simp [hwi] · simp /-- An affine combination over `s.subtype pred` equals one over `{x ∈ s \| pred x}`. -/ theorem affineCombination_subtype_eq_filter (w : ι → k) (p : ι → P) (pred : ι → Prop) [DecidablePred pred] : ((s.subtype pred).affineCombination k (fun i => p i) fun i => w i) = {x ∈ s \| pred x}.affineCombination k p w := by rw [affineCombination_apply, affineCombination_apply, weightedVSubOfPoint_subtype_eq_filter] /-- An affine combination over `{x ∈ s \| pred x}` equals one over `s` if all the weights at indices in `s` not satisfying `pred` are zero. -/ theorem affineCombination_filter_of_ne (w : ι → k) (p : ι → P) {pred : ι → Prop} [DecidablePred pred] (h : ∀ i ∈ s, w i ≠ 0 → pred i) : {x ∈ s \| pred x}.affineCombination k p w = s.affineCombination k p w := by rw [affineCombination_apply, affineCombination_apply, s.weightedVSubOfPoint_filter_of_ne _ _ _ h] /-- Suppose an indexed family of points is given, along with a subset of the index type. A vector can be expressed as `weightedVSubOfPoint` using a `Finset` lying within that subset and with a given sum of weights if and only if it can be expressed as `weightedVSubOfPoint` with that sum of weights for the corresponding indexed family whose index type is the subtype corresponding to that subset. -/ theorem eq_weightedVSubOfPoint_subset_iff_eq_weightedVSubOfPoint_subtype {v : V} {x : k} {s : Set ι} {p : ι → P} {b : P} : (∃ fs : Finset ι, ↑fs ⊆ s ∧ ∃ w : ι → k, ∑ i ∈ fs, w i = x ∧ v = fs.weightedVSubOfPoint p b w) ↔ ∃ (fs : Finset s) (w : s → k), ∑ i ∈ fs, w i = x ∧ v = fs.weightedVSubOfPoint (fun i : s => p i) b w := by classical simp_rw [weightedVSubOfPoint_apply] constructor · rintro ⟨fs, hfs, w, rfl, rfl⟩ exact ⟨fs.subtype s, fun i => w i, sum_subtype_of_mem _ hfs, (sum_subtype_of_mem _ hfs).symm⟩ · rintro ⟨fs, w, rfl, rfl⟩ refine ⟨fs.map (Function.Embedding.subtype _), map_subtype_subset _, fun i => if h : i ∈ s then w ⟨i, h⟩ else 0, ?_, ?_⟩ <;> simp variable (k) /-- Suppose an indexed family of points is given, along with a subset of the index type. A vector can be expressed as `weightedVSub` using a `Finset` lying within that subset and with sum of weights 0 if and only if it can be expressed as `weightedVSub` with sum of weights 0 for the corresponding indexed family whose index type is the subtype corresponding to that subset. -/ theorem eq_weightedVSub_subset_iff_eq_weightedVSub_subtype {v : V} {s : Set ι} {p : ι → P} : (∃ fs : Finset ι, ↑fs ⊆ s ∧ ∃ w : ι → k, ∑ i ∈ fs, w i = 0 ∧ v = fs.weightedVSub p w) ↔ ∃ (fs : Finset s) (w : s → k), ∑ i ∈ fs, w i = 0 ∧ v = fs.weightedVSub (fun i : s => p i) w := eq_weightedVSubOfPoint_subset_iff_eq_weightedVSubOfPoint_subtype variable (V) /-- Suppose an indexed family of points is given, along with a subset of the index type. A point can be expressed as an `affineCombination` using a `Finset` lying within that subset and with sum of weights 1 if and only if it can be expressed an `affineCombination` with sum of weights 1 for the corresponding indexed family whose index type is the subtype corresponding to that subset. -/ theorem eq_affineCombination_subset_iff_eq_affineCombination_subtype {p0 : P} {s : Set ι} {p : ι → P} : (∃ fs : Finset ι, ↑fs ⊆ s ∧ ∃ w : ι → k, ∑ i ∈ fs, w i = 1 ∧ p0 = fs.affineCombination k p w) ↔ ∃ (fs : Finset s) (w : s → k), ∑ i ∈ fs, w i = 1 ∧ p0 = fs.affineCombination k (fun i : s => p i) w := by simp_rw [affineCombination_apply, eq_vadd_iff_vsub_eq] exact eq_weightedVSubOfPoint_subset_iff_eq_weightedVSubOfPoint_subtype variable {k V} /-- Affine maps commute with affine combinations. -/ theorem map_affineCombination {V₂ P₂ : Type} [AddCommGroup V₂] [Module k V₂] [AffineSpace V₂ P₂] (p : ι → P) (w : ι → k) (hw : s.sum w = 1) (f : P →ᵃ[k] P₂) : f (s.affineCombination k p w) = s.affineCombination k (f ∘ p) w := by have b := Classical.choice (inferInstance : AffineSpace V P).nonempty have b₂ := Classical.choice (inferInstance : AffineSpace V₂ P₂).nonempty rw [s.affineCombination_eq_weightedVSubOfPoint_vadd_of_sum_eq_one w p hw b, s.affineCombination_eq_weightedVSubOfPoint_vadd_of_sum_eq_one w (f ∘ p) hw b₂, ← s.weightedVSubOfPoint_vadd_eq_of_sum_eq_one w (f ∘ p) hw (f b) b₂] simp only [weightedVSubOfPoint_apply, RingHom.id_apply, AffineMap.map_vadd, LinearMap.map_smulₛₗ, AffineMap.linearMap_vsub, map_sum, Function.comp_apply] /-- The value of `affineCombination`, where the given points take only two values. -/ lemma affineCombination_apply_eq_lineMap_sum [DecidableEq ι] (w : ι → k) (p : ι → P) (p₁ p₂ : P) (s' : Finset ι) (h : ∑ i ∈ s, w i = 1) (hp₂ : ∀ i ∈ s ∩ s', p i = p₂) (hp₁ : ∀ i ∈ s \ s', p i = p₁) : s.affineCombination k p w = AffineMap.lineMap p₁ p₂ (∑ i ∈ s ∩ s', w i) := by rw [s.affineCombination_eq_weightedVSubOfPoint_vadd_of_sum_eq_one w p h p₁, weightedVSubOfPoint_apply, ← s.sum_inter_add_sum_diff s', AffineMap.lineMap_apply, vadd_right_cancel_iff, sum_smul] convert add_zero _ with i hi · convert Finset.sum_const_zero with i hi simp [hp₁ i hi] · exact (hp₂ i hi).symm variable (k) /-- Weights for expressing a single point as an affine combination. -/ def affineCombinationSingleWeights [DecidableEq ι] (i : ι) : ι → k := Pi.single i 1 @[simp] theorem affineCombinationSingleWeights_apply_self [DecidableEq ι] (i : ι) : affineCombinationSingleWeights k i i = 1 := Pi.single_eq_same _ _ @[simp] theorem affineCombinationSingleWeights_apply_of_ne [DecidableEq ι] {i j : ι} (h : j ≠ i) : affineCombinationSingleWeights k i j = 0 := Pi.single_eq_of_ne h _ @[simp] theorem sum_affineCombinationSingleWeights [DecidableEq ι] {i : ι} (h : i ∈ s) : ∑ j ∈ s, affineCombinationSingleWeights k i j = 1 := by rw [← affineCombinationSingleWeights_apply_self k i] exact sum_eq_single_of_mem i h fun j _ hj => affineCombinationSingleWeights_apply_of_ne k hj /-- Weights for expressing the subtraction of two points as a `weightedVSub`. -/ def weightedVSubVSubWeights [DecidableEq ι] (i j : ι) : ι → k := affineCombinationSingleWeights k i - affineCombinationSingleWeights k j @[simp] theorem weightedVSubVSubWeights_self [DecidableEq ι] (i : ι) : weightedVSubVSubWeights k i i = 0 := by simp [weightedVSubVSubWeights] @[simp] theorem weightedVSubVSubWeights_apply_left [DecidableEq ι] {i j : ι} (h : i ≠ j) : weightedVSubVSubWeights k i j i = 1 := by simp [weightedVSubVSubWeights, h] @[simp] theorem weightedVSubVSubWeights_apply_right [DecidableEq ι] {i j : ι} (h : i ≠ j) : weightedVSubVSubWeights k i j j = -1 := by simp [weightedVSubVSubWeights, h.symm] @[simp] theorem weightedVSubVSubWeights_apply_of_ne [DecidableEq ι] {i j t : ι} (hi : t ≠ i) (hj : t ≠ j) : weightedVSubVSubWeights k i j t = 0 := by simp [weightedVSubVSubWeights, hi, hj] @[simp] theorem sum_weightedVSubVSubWeights [DecidableEq ι] {i j : ι} (hi : i ∈ s) (hj : j ∈ s) : ∑ t ∈ s, weightedVSubVSubWeights k i j t = 0 := by simp_rw [weightedVSubVSubWeights, Pi.sub_apply, sum_sub_distrib] simp [hi, hj] variable {k} /-- Weights for expressing `lineMap` as an affine combination. -/ def affineCombinationLineMapWeights [DecidableEq ι] (i j : ι) (c : k) : ι → k := c • weightedVSubVSubWeights k j i + affineCombinationSingleWeights k i @[simp] theorem affineCombinationLineMapWeights_self [DecidableEq ι] (i : ι) (c : k) : affineCombinationLineMapWeights i i c = affineCombinationSingleWeights k i := by simp [affineCombinationLineMapWeights] @[simp] theorem affineCombinationLineMapWeights_apply_left [DecidableEq ι] {i j : ι} (h : i ≠ j) (c : k) : affineCombinationLineMapWeights i j c i = 1 - c := by simp [affineCombinationLineMapWeights, h.symm, sub_eq_neg_add] @[simp] theorem affineCombinationLineMapWeights_apply_right [DecidableEq ι] {i j : ι} (h : i ≠ j) (c : k) : affineCombinationLineMapWeights i j c j = c := by simp [affineCombinationLineMapWeights, h.symm] @[simp] theorem affineCombinationLineMapWeights_apply_of_ne [DecidableEq ι] {i j t : ι} (hi : t ≠ i) (hj : t ≠ j) (c : k) : affineCombinationLineMapWeights i j c t = 0 := by simp [affineCombinationLineMapWeights, hi, hj] @[simp] theorem sum_affineCombinationLineMapWeights [DecidableEq ι] {i j : ι} (hi : i ∈ s) (hj : j ∈ s) (c : k) : ∑ t ∈ s, affineCombinationLineMapWeights i j c t = 1 := by simp_rw [affineCombinationLineMapWeights, Pi.add_apply, sum_add_distrib] simp [hi, hj, ← mul_sum] variable (k) /-- An affine combination with `affineCombinationSingleWeights` gives the specified point. -/ @[simp] theorem affineCombination_affineCombinationSingleWeights [DecidableEq ι] (p : ι → P) {i : ι} (hi : i ∈ s) : s.affineCombination k p (affineCombinationSingleWeights k i) = p i := by refine s.affineCombination_of_eq_one_of_eq_zero _ _ hi (by simp) ?_ rintro j - hj simp [hj] /-- A weighted subtraction with `weightedVSubVSubWeights` gives the result of subtracting the specified points. -/ @[simp] theorem weightedVSub_weightedVSubVSubWeights [DecidableEq ι] (p : ι → P) {i j : ι} (hi : i ∈ s) (hj : j ∈ s) : s.weightedVSub p (weightedVSubVSubWeights k i j) = p i -ᵥ p j := by rw [weightedVSubVSubWeights, ← affineCombination_vsub, s.affineCombination_affineCombinationSingleWeights k p hi, s.affineCombination_affineCombinationSingleWeights k p hj] variable {k} /-- An affine combination with `affineCombinationLineMapWeights` gives the result of `line_map`. -/ @[simp] theorem affineCombination_affineCombinationLineMapWeights [DecidableEq ι] (p : ι → P) {i j : ι} (hi : i ∈ s) (hj : j ∈ s) (c : k) : s.affineCombination k p (affineCombinationLineMapWeights i j c) = AffineMap.lineMap (p i) (p j) c := by rw [affineCombinationLineMapWeights, ← weightedVSub_vadd_affineCombination, weightedVSub_const_smul, s.affineCombination_affineCombinationSingleWeights k p hi, s.weightedVSub_weightedVSubVSubWeights k p hj hi, AffineMap.lineMap_apply] end Finset namespace Finset variable (k : Type) {V : Type} {P : Type} [DivisionRing k] [AddCommGroup V] [Module k V] variable [AffineSpace V P] {ι : Type} (s : Finset ι) {ι₂ : Type*} (s₂ : Finset ι₂) /-- The weights for the centroid of some points. -/ def centroidWeights : ι → k := Function.const ι (#s : k)⁻¹ /-- `centroidWeights` at any point. -/ @[simp] theorem centroidWeights_apply (i : ι) : s.centroidWeights k i = (#s : k)⁻¹ := rfl /-- `centroidWeights` equals a constant function. -/ theorem centroidWeights_eq_const : s.centroidWeights k = Function.const ι (#s : k)⁻¹ := rfl variable {k} in /-- The weights in the centroid sum to 1, if the number of points, converted to `k`, is not zero. -/ theorem sum_centroidWeights_eq_one_of_cast_card_ne_zero (h : (#s : k) ≠ 0) : ∑ i ∈ s, s.centroidWeights k i = 1 := by simp [h] /-- In the characteristic zero case, the weights in the centroid sum to 1 if the number of points is not zero. -/ theorem sum_centroidWeights_eq_one_of_card_ne_zero [CharZero k] (h : #s ≠ 0) : ∑ i ∈ s, s.centroidWeights k i = 1 := by simp_all /-- In the characteristic zero case, the weights in the centroid sum to 1 if the set is nonempty. -/ theorem sum_centroidWeights_eq_one_of_nonempty [CharZero k] (h : s.Nonempty) : ∑ i ∈ s, s.centroidWeights k i = 1 := s.sum_centroidWeights_eq_one_of_card_ne_zero k (ne_of_gt (card_pos.2 h)) /-- In the characteristic zero case, the weights in the centroid sum to 1 if the number of points is `n + 1`. -/ theorem sum_centroidWeights_eq_one_of_card_eq_add_one [CharZero k] {n : ℕ} (h : #s = n + 1) : ∑ i ∈ s, s.centroidWeights k i = 1 := s.sum_centroidWeights_eq_one_of_card_ne_zero k (h.symm ▸ Nat.succ_ne_zero n) /-- The centroid of some points. Although defined for any `s`, this is intended to be used in the case where the number of points, converted to `k`, is not zero. -/ def centroid (p : ι → P) : P := s.affineCombination k p (s.centroidWeights k) /-- The definition of the centroid. -/ theorem centroid_def (p : ι → P) : s.centroid k p = s.affineCombination k p (s.centroidWeights k) := rfl theorem centroid_univ (s : Finset P) : univ.centroid k ((↑) : s → P) = s.centroid k id := by rw [centroid, centroid, ← s.attach_affineCombination_coe] congr ext simp /-- The centroid of a single point. -/ @[simp] theorem centroid_singleton (p : ι → P) (i : ι) : ({i} : Finset ι).centroid k p = p i := by simp [centroid_def, affineCombination_apply] /-- The centroid of two points, expressed directly as adding a vector to a point. -/ theorem centroid_pair [DecidableEq ι] [Invertible (2 : k)] (p : ι → P) (i₁ i₂ : ι) : ({i₁, i₂} : Finset ι).centroid k p = (2⁻¹ : k) • (p i₂ -ᵥ p i₁) +ᵥ p i₁ := by by_cases h : i₁ = i₂ · simp [h] · have hc : (#{i₁, i₂} : k) ≠ 0 := by rw [card_insert_of_not_mem (not_mem_singleton.2 h), card_singleton] norm_num exact Invertible.ne_zero _ rw [centroid_def, affineCombination_eq_weightedVSubOfPoint_vadd_of_sum_eq_one _ _ _ (sum_centroidWeights_eq_one_of_cast_card_ne_zero _ hc) (p i₁)] simp [h, one_add_one_eq_two] /-- The centroid of two points indexed by `Fin 2`, expressed directly as adding a vector to the first point. -/ theorem centroid_pair_fin [Invertible (2 : k)] (p : Fin 2 → P) : univ.centroid k p = (2⁻¹ : k) • (p 1 -ᵥ p 0) +ᵥ p 0 := by rw [univ_fin2] convert centroid_pair k p 0 1 /-- A centroid, over the image of an embedding, equals a centroid with the same points and weights over the original `Finset`. -/ theorem centroid_map (e : ι₂ ↪ ι) (p : ι → P) : (s₂.map e).centroid k p = s₂.centroid k (p ∘ e) := by simp [centroid_def, affineCombination_map, centroidWeights] /-- `centroidWeights` gives the weights for the centroid as a constant function, which is suitable when summing over the points whose centroid is being taken. This function gives the weights in a form suitable for summing over a larger set of points, as an indicator function that is zero outside the set whose centroid is being taken. In the case of a `Fintype`, the sum may be over `univ`. -/ def centroidWeightsIndicator : ι → k := Set.indicator (↑s) (s.centroidWeights k) /-- The definition of `centroidWeightsIndicator`. -/ theorem centroidWeightsIndicator_def : s.centroidWeightsIndicator k = Set.indicator (↑s) (s.centroidWeights k) := rfl /-- The sum of the weights for the centroid indexed by a `Fintype`. -/ theorem sum_centroidWeightsIndicator [Fintype ι] : ∑ i, s.centroidWeightsIndicator k i = ∑ i ∈ s, s.centroidWeights k i := sum_indicator_subset _ (subset_univ _) /-- In the characteristic zero case, the weights in the centroid indexed by a `Fintype` sum to 1 if the number of points is not zero. -/ theorem sum_centroidWeightsIndicator_eq_one_of_card_ne_zero [CharZero k] [Fintype ι] (h : #s ≠ 0) : ∑ i, s.centroidWeightsIndicator k i = 1 := by rw [sum_centroidWeightsIndicator] exact s.sum_centroidWeights_eq_one_of_card_ne_zero k h /-- In the characteristic zero case, the weights in the centroid indexed by a `Fintype` sum to 1 if the set is nonempty. -/ theorem sum_centroidWeightsIndicator_eq_one_of_nonempty [CharZero k] [Fintype ι] (h : s.Nonempty) : ∑ i, s.centroidWeightsIndicator k i = 1 := by rw [sum_centroidWeightsIndicator] exact s.sum_centroidWeights_eq_one_of_nonempty k h /-- In the characteristic zero case, the weights in the centroid indexed by a `Fintype` sum to 1 if the number of points is `n + 1`. -/ theorem sum_centroidWeightsIndicator_eq_one_of_card_eq_add_one [CharZero k] [Fintype ι] {n : ℕ} (h : #s = n + 1) : ∑ i, s.centroidWeightsIndicator k i = 1 := by rw [sum_centroidWeightsIndicator] exact s.sum_centroidWeights_eq_one_of_card_eq_add_one k h /-- The centroid as an affine combination over a `Fintype`. -/ theorem centroid_eq_affineCombination_fintype [Fintype ι] (p : ι → P) : s.centroid k p = univ.affineCombination k p (s.centroidWeightsIndicator k) := affineCombination_indicator_subset _ _ (subset_univ _) /-- An indexed family of points that is injective on the given `Finset` has the same centroid as the image of that `Finset`. This is stated in terms of a set equal to the image to provide control of definitional equality for the index type used for the centroid of the image. -/ theorem centroid_eq_centroid_image_of_inj_on {p : ι → P} (hi : ∀ i ∈ s, ∀ j ∈ s, p i = p j → i = j) {ps : Set P} [Fintype ps] (hps : ps = p '' ↑s) : s.centroid k p = (univ : Finset ps).centroid k fun x => (x : P) := by let f : p '' ↑s → ι := fun x => x.property.choose have hf : ∀ x, f x ∈ s ∧ p (f x) = x := fun x => x.property.choose_spec let f' : ps → ι := fun x => f ⟨x, hps ▸ x.property⟩ have hf' : ∀ x, f' x ∈ s ∧ p (f' x) = x := fun x => hf ⟨x, hps ▸ x.property⟩	have hf'i : Function.Injective f' := by intro x y h rw [Subtype.ext_iff, ← (hf' x).2, ← (hf' y).2, h] let f'e : ps ↪ ι := ⟨f', hf'i⟩	Mathlib/LinearAlgebra/AffineSpace/Combination.lean	869	872
/- Copyright (c) 2016 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mario Carneiro -/ import Mathlib.Data.Set.Defs import Mathlib.Logic.Basic import Mathlib.Logic.ExistsUnique import Mathlib.Logic.Nonempty import Mathlib.Logic.Nontrivial.Defs import Batteries.Tactic.Init import Mathlib.Order.Defs.Unbundled /-! # Miscellaneous function constructions and lemmas -/ open Function universe u v w namespace Function section variable {α β γ : Sort} {f : α → β} /-- Evaluate a function at an argument. Useful if you want to talk about the partially applied `Function.eval x : (∀ x, β x) → β x`. -/ @[reducible, simp] def eval {β : α → Sort} (x : α) (f : ∀ x, β x) : β x := f x theorem eval_apply {β : α → Sort} (x : α) (f : ∀ x, β x) : eval x f = f x := rfl theorem const_def {y : β} : (fun _ : α ↦ y) = const α y := rfl theorem const_injective [Nonempty α] : Injective (const α : β → α → β) := fun _ _ h ↦ let ⟨x⟩ := ‹Nonempty α› congr_fun h x @[simp] theorem const_inj [Nonempty α] {y₁ y₂ : β} : const α y₁ = const α y₂ ↔ y₁ = y₂ := ⟨fun h ↦ const_injective h, fun h ↦ h ▸ rfl⟩ theorem onFun_apply (f : β → β → γ) (g : α → β) (a b : α) : onFun f g a b = f (g a) (g b) := rfl lemma hfunext {α α' : Sort u} {β : α → Sort v} {β' : α' → Sort v} {f : ∀a, β a} {f' : ∀a, β' a} (hα : α = α') (h : ∀a a', HEq a a' → HEq (f a) (f' a')) : HEq f f' := by subst hα have : ∀a, HEq (f a) (f' a) := fun a ↦ h a a (HEq.refl a) have : β = β' := by funext a; exact type_eq_of_heq (this a) subst this apply heq_of_eq funext a exact eq_of_heq (this a) theorem ne_iff {β : α → Sort} {f₁ f₂ : ∀ a, β a} : f₁ ≠ f₂ ↔ ∃ a, f₁ a ≠ f₂ a := funext_iff.not.trans not_forall lemma funext_iff_of_subsingleton [Subsingleton α] {g : α → β} (x y : α) : f x = g y ↔ f = g := by refine ⟨fun h ↦ funext fun z ↦ ?_, fun h ↦ ?_⟩ · rwa [Subsingleton.elim x z, Subsingleton.elim y z] at h · rw [h, Subsingleton.elim x y] theorem swap_lt {α} [LT α] : swap (· < · : α → α → _) = (· > ·) := rfl theorem swap_le {α} [LE α] : swap (· ≤ · : α → α → _) = (· ≥ ·) := rfl theorem swap_gt {α} [LT α] : swap (· > · : α → α → _) = (· < ·) := rfl theorem swap_ge {α} [LE α] : swap (· ≥ · : α → α → _) = (· ≤ ·) := rfl protected theorem Bijective.injective {f : α → β} (hf : Bijective f) : Injective f := hf.1 protected theorem Bijective.surjective {f : α → β} (hf : Bijective f) : Surjective f := hf.2 theorem not_injective_iff : ¬ Injective f ↔ ∃ a b, f a = f b ∧ a ≠ b := by simp only [Injective, not_forall, exists_prop] /-- If the co-domain `β` of an injective function `f : α → β` has decidable equality, then the domain `α` also has decidable equality. -/ protected def Injective.decidableEq [DecidableEq β] (I : Injective f) : DecidableEq α := fun _ _ ↦ decidable_of_iff _ I.eq_iff theorem Injective.of_comp {g : γ → α} (I : Injective (f ∘ g)) : Injective g := fun _ _ h ↦ I <\| congr_arg f h @[simp] theorem Injective.of_comp_iff (hf : Injective f) (g : γ → α) : Injective (f ∘ g) ↔ Injective g := ⟨Injective.of_comp, hf.comp⟩ theorem Injective.of_comp_right {g : γ → α} (I : Injective (f ∘ g)) (hg : Surjective g) : Injective f := fun x y h ↦ by obtain ⟨x, rfl⟩ := hg x obtain ⟨y, rfl⟩ := hg y exact congr_arg g (I h) theorem Surjective.bijective₂_of_injective {g : γ → α} (hf : Surjective f) (hg : Surjective g) (I : Injective (f ∘ g)) : Bijective f ∧ Bijective g := ⟨⟨I.of_comp_right hg, hf⟩, I.of_comp, hg⟩ @[simp] theorem Injective.of_comp_iff' (f : α → β) {g : γ → α} (hg : Bijective g) : Injective (f ∘ g) ↔ Injective f := ⟨fun I ↦ I.of_comp_right hg.2, fun h ↦ h.comp hg.injective⟩ theorem Injective.piMap {ι : Sort} {α β : ι → Sort} {f : ∀ i, α i → β i} (hf : ∀ i, Injective (f i)) : Injective (Pi.map f) := fun _ _ h ↦ funext fun i ↦ hf i <\| congrFun h _ /-- Composition by an injective function on the left is itself injective. -/ theorem Injective.comp_left {g : β → γ} (hg : Injective g) : Injective (g ∘ · : (α → β) → α → γ) := .piMap fun _ ↦ hg theorem injective_comp_left_iff [Nonempty α] {g : β → γ} : Injective (g ∘ · : (α → β) → α → γ) ↔ Injective g := ⟨fun h b₁ b₂ eq ↦ Nonempty.elim ‹_› (congr_fun <\| h (a₁ := fun _ ↦ b₁) (a₂ := fun _ ↦ b₂) <\| funext fun _ ↦ eq), (·.comp_left)⟩ @[nontriviality] theorem injective_of_subsingleton [Subsingleton α] (f : α → β) : Injective f := fun _ _ _ ↦ Subsingleton.elim _ _ @[nontriviality] theorem bijective_of_subsingleton [Subsingleton α] (f : α → α) : Bijective f := ⟨injective_of_subsingleton f, fun a ↦ ⟨a, Subsingleton.elim ..⟩⟩ lemma Injective.dite (p : α → Prop) [DecidablePred p] {f : {a : α // p a} → β} {f' : {a : α // ¬ p a} → β} (hf : Injective f) (hf' : Injective f') (im_disj : ∀ {x x' : α} {hx : p x} {hx' : ¬ p x'}, f ⟨x, hx⟩ ≠ f' ⟨x', hx'⟩) : Function.Injective (fun x ↦ if h : p x then f ⟨x, h⟩ else f' ⟨x, h⟩) := fun x₁ x₂ h => by dsimp only at h by_cases h₁ : p x₁ <;> by_cases h₂ : p x₂ · rw [dif_pos h₁, dif_pos h₂] at h; injection (hf h) · rw [dif_pos h₁, dif_neg h₂] at h; exact (im_disj h).elim · rw [dif_neg h₁, dif_pos h₂] at h; exact (im_disj h.symm).elim · rw [dif_neg h₁, dif_neg h₂] at h; injection (hf' h) theorem Surjective.of_comp {g : γ → α} (S : Surjective (f ∘ g)) : Surjective f := fun y ↦ let ⟨x, h⟩ := S y ⟨g x, h⟩ @[simp] theorem Surjective.of_comp_iff (f : α → β) {g : γ → α} (hg : Surjective g) : Surjective (f ∘ g) ↔ Surjective f := ⟨Surjective.of_comp, fun h ↦ h.comp hg⟩ theorem Surjective.of_comp_left {g : γ → α} (S : Surjective (f ∘ g)) (hf : Injective f) : Surjective g := fun a ↦ let ⟨c, hc⟩ := S (f a); ⟨c, hf hc⟩ theorem Injective.bijective₂_of_surjective {g : γ → α} (hf : Injective f) (hg : Injective g) (S : Surjective (f ∘ g)) : Bijective f ∧ Bijective g := ⟨⟨hf, S.of_comp⟩, hg, S.of_comp_left hf⟩ @[simp] theorem Surjective.of_comp_iff' (hf : Bijective f) (g : γ → α) : Surjective (f ∘ g) ↔ Surjective g := ⟨fun S ↦ S.of_comp_left hf.1, hf.surjective.comp⟩ instance decidableEqPFun (p : Prop) [Decidable p] (α : p → Type) [∀ hp, DecidableEq (α hp)] : DecidableEq (∀ hp, α hp) \| f, g => decidable_of_iff (∀ hp, f hp = g hp) funext_iff.symm protected theorem Surjective.forall (hf : Surjective f) {p : β → Prop} : (∀ y, p y) ↔ ∀ x, p (f x) := ⟨fun h x ↦ h (f x), fun h y ↦ let ⟨x, hx⟩ := hf y hx ▸ h x⟩ protected theorem Surjective.forall₂ (hf : Surjective f) {p : β → β → Prop} : (∀ y₁ y₂, p y₁ y₂) ↔ ∀ x₁ x₂, p (f x₁) (f x₂) := hf.forall.trans <\| forall_congr' fun _ ↦ hf.forall protected theorem Surjective.forall₃ (hf : Surjective f) {p : β → β → β → Prop} : (∀ y₁ y₂ y₃, p y₁ y₂ y₃) ↔ ∀ x₁ x₂ x₃, p (f x₁) (f x₂) (f x₃) := hf.forall.trans <\| forall_congr' fun _ ↦ hf.forall₂ protected theorem Surjective.exists (hf : Surjective f) {p : β → Prop} : (∃ y, p y) ↔ ∃ x, p (f x) := ⟨fun ⟨y, hy⟩ ↦ let ⟨x, hx⟩ := hf y ⟨x, hx.symm ▸ hy⟩, fun ⟨x, hx⟩ ↦ ⟨f x, hx⟩⟩ protected theorem Surjective.exists₂ (hf : Surjective f) {p : β → β → Prop} : (∃ y₁ y₂, p y₁ y₂) ↔ ∃ x₁ x₂, p (f x₁) (f x₂) := hf.exists.trans <\| exists_congr fun _ ↦ hf.exists protected theorem Surjective.exists₃ (hf : Surjective f) {p : β → β → β → Prop} : (∃ y₁ y₂ y₃, p y₁ y₂ y₃) ↔ ∃ x₁ x₂ x₃, p (f x₁) (f x₂) (f x₃) := hf.exists.trans <\| exists_congr fun _ ↦ hf.exists₂ theorem Surjective.injective_comp_right (hf : Surjective f) : Injective fun g : β → γ ↦ g ∘ f := fun _ _ h ↦ funext <\| hf.forall.2 <\| congr_fun h theorem injective_comp_right_iff_surjective {γ : Type} [Nontrivial γ] : Injective (fun g : β → γ ↦ g ∘ f) ↔ Surjective f := by refine ⟨not_imp_not.mp fun not_surj inj ↦ not_subsingleton γ ⟨fun c c' ↦ ?_⟩, (·.injective_comp_right)⟩ have ⟨b₀, hb⟩ := not_forall.mp not_surj classical have := inj (a₁ := fun _ ↦ c) (a₂ := (if · = b₀ then c' else c)) ?_ · simpa using congr_fun this b₀ ext a; simp only [comp_apply, if_neg fun h ↦ hb ⟨a, h⟩] protected theorem Surjective.right_cancellable (hf : Surjective f) {g₁ g₂ : β → γ} : g₁ ∘ f = g₂ ∘ f ↔ g₁ = g₂ := hf.injective_comp_right.eq_iff theorem surjective_of_right_cancellable_Prop (h : ∀ g₁ g₂ : β → Prop, g₁ ∘ f = g₂ ∘ f → g₁ = g₂) : Surjective f := injective_comp_right_iff_surjective.mp h theorem bijective_iff_existsUnique (f : α → β) : Bijective f ↔ ∀ b : β, ∃! a : α, f a = b := ⟨fun hf b ↦ let ⟨a, ha⟩ := hf.surjective b ⟨a, ha, fun _ ha' ↦ hf.injective (ha'.trans ha.symm)⟩, fun he ↦ ⟨fun {_a a'} h ↦ (he (f a')).unique h rfl, fun b ↦ (he b).exists⟩⟩ /-- Shorthand for using projection notation with `Function.bijective_iff_existsUnique`. -/ protected theorem Bijective.existsUnique {f : α → β} (hf : Bijective f) (b : β) : ∃! a : α, f a = b := (bijective_iff_existsUnique f).mp hf b theorem Bijective.existsUnique_iff {f : α → β} (hf : Bijective f) {p : β → Prop} : (∃! y, p y) ↔ ∃! x, p (f x) := ⟨fun ⟨y, hpy, hy⟩ ↦ let ⟨x, hx⟩ := hf.surjective y ⟨x, by simpa [hx], fun z (hz : p (f z)) ↦ hf.injective <\| hx.symm ▸ hy _ hz⟩, fun ⟨x, hpx, hx⟩ ↦ ⟨f x, hpx, fun y hy ↦ let ⟨z, hz⟩ := hf.surjective y hz ▸ congr_arg f (hx _ (by simpa [hz]))⟩⟩ theorem Bijective.of_comp_iff (f : α → β) {g : γ → α} (hg : Bijective g) : Bijective (f ∘ g) ↔ Bijective f := and_congr (Injective.of_comp_iff' _ hg) (Surjective.of_comp_iff _ hg.surjective) theorem Bijective.of_comp_iff' {f : α → β} (hf : Bijective f) (g : γ → α) : Function.Bijective (f ∘ g) ↔ Function.Bijective g := and_congr (Injective.of_comp_iff hf.injective _) (Surjective.of_comp_iff' hf _) /-- Cantor's diagonal argument implies that there are no surjective functions from `α` to `Set α`. -/ theorem cantor_surjective {α} (f : α → Set α) : ¬Surjective f \| h => let ⟨D, e⟩ := h {a \| ¬ f a a} @iff_not_self (D ∈ f D) <\| iff_of_eq <\| congr_arg (D ∈ ·) e /-- Cantor's diagonal argument implies that there are no injective functions from `Set α` to `α`. -/ theorem cantor_injective {α : Type} (f : Set α → α) : ¬Injective f \| i => cantor_surjective (fun a ↦ {b \| ∀ U, a = f U → U b}) <\| RightInverse.surjective (fun U ↦ Set.ext fun _ ↦ ⟨fun h ↦ h U rfl, fun h _ e ↦ i e ▸ h⟩) /-- There is no surjection from `α : Type u` into `Type (max u v)`. This theorem demonstrates why `Type : Type` would be inconsistent in Lean. -/ theorem not_surjective_Type {α : Type u} (f : α → Type max u v) : ¬Surjective f := by intro hf let T : Type max u v := Sigma f cases hf (Set T) with \| intro U hU => let g : Set T → T := fun s ↦ ⟨U, cast hU.symm s⟩ have hg : Injective g := by intro s t h suffices cast hU (g s).2 = cast hU (g t).2 by simp only [g, cast_cast, cast_eq] at this assumption · congr exact cantor_injective g hg /-- `g` is a partial inverse to `f` (an injective but not necessarily surjective function) if `g y = some x` implies `f x = y`, and `g y = none` implies that `y` is not in the range of `f`. -/ def IsPartialInv {α β} (f : α → β) (g : β → Option α) : Prop := ∀ x y, g y = some x ↔ f x = y theorem isPartialInv_left {α β} {f : α → β} {g} (H : IsPartialInv f g) (x) : g (f x) = some x := (H _ _).2 rfl theorem injective_of_isPartialInv {α β} {f : α → β} {g} (H : IsPartialInv f g) : Injective f := fun _ _ h ↦ Option.some.inj <\| ((H _ _).2 h).symm.trans ((H _ _).2 rfl) theorem injective_of_isPartialInv_right {α β} {f : α → β} {g} (H : IsPartialInv f g) (x y b) (h₁ : b ∈ g x) (h₂ : b ∈ g y) : x = y := ((H _ _).1 h₁).symm.trans ((H _ _).1 h₂) theorem LeftInverse.comp_eq_id {f : α → β} {g : β → α} (h : LeftInverse f g) : f ∘ g = id := funext h theorem leftInverse_iff_comp {f : α → β} {g : β → α} : LeftInverse f g ↔ f ∘ g = id := ⟨LeftInverse.comp_eq_id, congr_fun⟩ theorem RightInverse.comp_eq_id {f : α → β} {g : β → α} (h : RightInverse f g) : g ∘ f = id := funext h theorem rightInverse_iff_comp {f : α → β} {g : β → α} : RightInverse f g ↔ g ∘ f = id := ⟨RightInverse.comp_eq_id, congr_fun⟩ theorem LeftInverse.comp {f : α → β} {g : β → α} {h : β → γ} {i : γ → β} (hf : LeftInverse f g) (hh : LeftInverse h i) : LeftInverse (h ∘ f) (g ∘ i) := fun a ↦ show h (f (g (i a))) = a by rw [hf (i a), hh a] theorem RightInverse.comp {f : α → β} {g : β → α} {h : β → γ} {i : γ → β} (hf : RightInverse f g) (hh : RightInverse h i) : RightInverse (h ∘ f) (g ∘ i) := LeftInverse.comp hh hf theorem LeftInverse.rightInverse {f : α → β} {g : β → α} (h : LeftInverse g f) : RightInverse f g := h theorem RightInverse.leftInverse {f : α → β} {g : β → α} (h : RightInverse g f) : LeftInverse f g := h theorem LeftInverse.surjective {f : α → β} {g : β → α} (h : LeftInverse f g) : Surjective f := h.rightInverse.surjective theorem RightInverse.injective {f : α → β} {g : β → α} (h : RightInverse f g) : Injective f := h.leftInverse.injective theorem LeftInverse.rightInverse_of_injective {f : α → β} {g : β → α} (h : LeftInverse f g) (hf : Injective f) : RightInverse f g := fun x ↦ hf <\| h (f x) theorem LeftInverse.rightInverse_of_surjective {f : α → β} {g : β → α} (h : LeftInverse f g) (hg : Surjective g) : RightInverse f g := fun x ↦ let ⟨y, hy⟩ := hg x; hy ▸ congr_arg g (h y) theorem RightInverse.leftInverse_of_surjective {f : α → β} {g : β → α} : RightInverse f g → Surjective f → LeftInverse f g := LeftInverse.rightInverse_of_surjective theorem RightInverse.leftInverse_of_injective {f : α → β} {g : β → α} : RightInverse f g → Injective g → LeftInverse f g := LeftInverse.rightInverse_of_injective theorem LeftInverse.eq_rightInverse {f : α → β} {g₁ g₂ : β → α} (h₁ : LeftInverse g₁ f) (h₂ : RightInverse g₂ f) : g₁ = g₂ := calc g₁ = g₁ ∘ f ∘ g₂ := by rw [h₂.comp_eq_id, comp_id] _ = g₂ := by rw [← comp_assoc, h₁.comp_eq_id, id_comp] /-- We can use choice to construct explicitly a partial inverse for a given injective function `f`. -/ noncomputable def partialInv {α β} (f : α → β) (b : β) : Option α := open scoped Classical in if h : ∃ a, f a = b then some (Classical.choose h) else none theorem partialInv_of_injective {α β} {f : α → β} (I : Injective f) : IsPartialInv f (partialInv f) \| a, b => ⟨fun h => open scoped Classical in have hpi : partialInv f b = if h : ∃ a, f a = b then some (Classical.choose h) else none := rfl if h' : ∃ a, f a = b then by rw [hpi, dif_pos h'] at h injection h with h subst h apply Classical.choose_spec h' else by rw [hpi, dif_neg h'] at h; contradiction, fun e => e ▸ have h : ∃ a', f a' = f a := ⟨_, rfl⟩ (dif_pos h).trans (congr_arg _ (I <\| Classical.choose_spec h))⟩ theorem partialInv_left {α β} {f : α → β} (I : Injective f) : ∀ x, partialInv f (f x) = some x := isPartialInv_left (partialInv_of_injective I) end section InvFun variable {α β : Sort} [Nonempty α] {f : α → β} {b : β} /-- The inverse of a function (which is a left inverse if `f` is injective and a right inverse if `f` is surjective). -/ -- Explicit Sort so that `α` isn't inferred to be Prop via `exists_prop_decidable` noncomputable def invFun {α : Sort u} {β} [Nonempty α] (f : α → β) : β → α := open scoped Classical in fun y ↦ if h : (∃ x, f x = y) then h.choose else Classical.arbitrary α theorem invFun_eq (h : ∃ a, f a = b) : f (invFun f b) = b := by simp only [invFun, dif_pos h, h.choose_spec] theorem apply_invFun_apply {α β : Type} {f : α → β} {a : α} : f (@invFun _ _ ⟨a⟩ f (f a)) = f a := @invFun_eq _ _ ⟨a⟩ _ _ ⟨_, rfl⟩ theorem invFun_neg (h : ¬∃ a, f a = b) : invFun f b = Classical.choice ‹_› := dif_neg h theorem invFun_eq_of_injective_of_rightInverse {g : β → α} (hf : Injective f) (hg : RightInverse g f) : invFun f = g := funext fun b ↦ hf (by rw [hg b] exact invFun_eq ⟨g b, hg b⟩) theorem rightInverse_invFun (hf : Surjective f) : RightInverse (invFun f) f := fun b ↦ invFun_eq <\| hf b theorem leftInverse_invFun (hf : Injective f) : LeftInverse (invFun f) f := fun b ↦ hf <\| invFun_eq ⟨b, rfl⟩ theorem invFun_surjective (hf : Injective f) : Surjective (invFun f) := (leftInverse_invFun hf).surjective theorem invFun_comp (hf : Injective f) : invFun f ∘ f = id := funext <\| leftInverse_invFun hf theorem Injective.hasLeftInverse (hf : Injective f) : HasLeftInverse f := ⟨invFun f, leftInverse_invFun hf⟩ theorem injective_iff_hasLeftInverse : Injective f ↔ HasLeftInverse f := ⟨Injective.hasLeftInverse, HasLeftInverse.injective⟩ end InvFun section SurjInv variable {α : Sort u} {β : Sort v} {γ : Sort w} {f : α → β} /-- The inverse of a surjective function. (Unlike `invFun`, this does not require `α` to be inhabited.) -/ noncomputable def surjInv {f : α → β} (h : Surjective f) (b : β) : α := Classical.choose (h b) theorem surjInv_eq (h : Surjective f) (b) : f (surjInv h b) = b := Classical.choose_spec (h b) theorem rightInverse_surjInv (hf : Surjective f) : RightInverse (surjInv hf) f := surjInv_eq hf theorem leftInverse_surjInv (hf : Bijective f) : LeftInverse (surjInv hf.2) f := rightInverse_of_injective_of_leftInverse hf.1 (rightInverse_surjInv hf.2) theorem Surjective.hasRightInverse (hf : Surjective f) : HasRightInverse f := ⟨_, rightInverse_surjInv hf⟩ theorem surjective_iff_hasRightInverse : Surjective f ↔ HasRightInverse f := ⟨Surjective.hasRightInverse, HasRightInverse.surjective⟩ theorem bijective_iff_has_inverse : Bijective f ↔ ∃ g, LeftInverse g f ∧ RightInverse g f := ⟨fun hf ↦ ⟨_, leftInverse_surjInv hf, rightInverse_surjInv hf.2⟩, fun ⟨_, gl, gr⟩ ↦ ⟨gl.injective, gr.surjective⟩⟩ theorem injective_surjInv (h : Surjective f) : Injective (surjInv h) := (rightInverse_surjInv h).injective theorem surjective_to_subsingleton [na : Nonempty α] [Subsingleton β] (f : α → β) : Surjective f := fun _ ↦ let ⟨a⟩ := na; ⟨a, Subsingleton.elim _ _⟩ theorem Surjective.piMap {ι : Sort} {α β : ι → Sort} {f : ∀ i, α i → β i} (hf : ∀ i, Surjective (f i)) : Surjective (Pi.map f) := fun g ↦ ⟨fun i ↦ surjInv (hf i) (g i), funext fun _ ↦ rightInverse_surjInv _ _⟩ /-- Composition by a surjective function on the left is itself surjective. -/ theorem Surjective.comp_left {g : β → γ} (hg : Surjective g) : Surjective (g ∘ · : (α → β) → α → γ) := .piMap fun _ ↦ hg theorem surjective_comp_left_iff [Nonempty α] {g : β → γ} : Surjective (g ∘ · : (α → β) → α → γ) ↔ Surjective g := by refine ⟨fun h c ↦ Nonempty.elim ‹_› fun a ↦ ?_, (·.comp_left)⟩ have ⟨f, hf⟩ := h fun _ ↦ c exact ⟨f a, congr_fun hf _⟩ theorem Bijective.piMap {ι : Sort} {α β : ι → Sort} {f : ∀ i, α i → β i} (hf : ∀ i, Bijective (f i)) : Bijective (Pi.map f) := ⟨.piMap fun i ↦ (hf i).1, .piMap fun i ↦ (hf i).2⟩ /-- Composition by a bijective function on the left is itself bijective. -/ theorem Bijective.comp_left {g : β → γ} (hg : Bijective g) : Bijective (g ∘ · : (α → β) → α → γ) := ⟨hg.injective.comp_left, hg.surjective.comp_left⟩ end SurjInv section Update variable {α : Sort u} {β : α → Sort v} {α' : Sort w} [DecidableEq α] {f : (a : α) → β a} {a : α} {b : β a} /-- Replacing the value of a function at a given point by a given value. -/ def update (f : ∀ a, β a) (a' : α) (v : β a') (a : α) : β a := if h : a = a' then Eq.ndrec v h.symm else f a @[simp] theorem update_self (a : α) (v : β a) (f : ∀ a, β a) : update f a v a = v := dif_pos rfl @[deprecated (since := "2024-12-28")] alias update_same := update_self @[simp] theorem update_of_ne {a a' : α} (h : a ≠ a') (v : β a') (f : ∀ a, β a) : update f a' v a = f a := dif_neg h @[deprecated (since := "2024-12-28")] alias update_noteq := update_of_ne /-- On non-dependent functions, `Function.update` can be expressed as an `ite` -/ theorem update_apply {β : Sort} (f : α → β) (a' : α) (b : β) (a : α) : update f a' b a = if a = a' then b else f a := by rcases Decidable.eq_or_ne a a' with rfl \| hne <;> simp [] @[nontriviality] theorem update_eq_const_of_subsingleton [Subsingleton α] (a : α) (v : α') (f : α → α') : update f a v = const α v := funext fun a' ↦ Subsingleton.elim a a' ▸ update_self .. theorem surjective_eval {α : Sort u} {β : α → Sort v} [h : ∀ a, Nonempty (β a)] (a : α) : Surjective (eval a : (∀ a, β a) → β a) := fun b ↦ ⟨@update _ _ (Classical.decEq α) (fun a ↦ (h a).some) a b, @update_self _ _ (Classical.decEq α) _ _ _⟩ theorem update_injective (f : ∀ a, β a) (a' : α) : Injective (update f a') := fun v v' h ↦ by have := congr_fun h a' rwa [update_self, update_self] at this lemma forall_update_iff (f : ∀a, β a) {a : α} {b : β a} (p : ∀a, β a → Prop) : (∀ x, p x (update f a b x)) ↔ p a b ∧ ∀ x, x ≠ a → p x (f x) := by rw [← and_forall_ne a, update_self] simp +contextual theorem exists_update_iff (f : ∀ a, β a) {a : α} {b : β a} (p : ∀ a, β a → Prop) : (∃ x, p x (update f a b x)) ↔ p a b ∨ ∃ x ≠ a, p x (f x) := by rw [← not_forall_not, forall_update_iff f fun a b ↦ ¬p a b] simp [-not_and, not_and_or] theorem update_eq_iff {a : α} {b : β a} {f g : ∀ a, β a} : update f a b = g ↔ b = g a ∧ ∀ x ≠ a, f x = g x := funext_iff.trans <\| forall_update_iff _ fun x y ↦ y = g x theorem eq_update_iff {a : α} {b : β a} {f g : ∀ a, β a} : g = update f a b ↔ g a = b ∧ ∀ x ≠ a, g x = f x := funext_iff.trans <\| forall_update_iff _ fun x y ↦ g x = y @[simp] lemma update_eq_self_iff : update f a b = f ↔ b = f a := by simp [update_eq_iff] @[simp] lemma eq_update_self_iff : f = update f a b ↔ f a = b := by simp [eq_update_iff] lemma ne_update_self_iff : f ≠ update f a b ↔ f a ≠ b := eq_update_self_iff.not lemma update_ne_self_iff : update f a b ≠ f ↔ b ≠ f a := update_eq_self_iff.not @[simp] theorem update_eq_self (a : α) (f : ∀ a, β a) : update f a (f a) = f := update_eq_iff.2 ⟨rfl, fun _ _ ↦ rfl⟩ theorem update_comp_eq_of_forall_ne' {α'} (g : ∀ a, β a) {f : α' → α} {i : α} (a : β i) (h : ∀ x, f x ≠ i) : (fun j ↦ (update g i a) (f j)) = fun j ↦ g (f j) := funext fun _ ↦ update_of_ne (h _) _ _ variable [DecidableEq α'] /-- Non-dependent version of `Function.update_comp_eq_of_forall_ne'` -/ theorem update_comp_eq_of_forall_ne {α β : Sort} (g : α' → β) {f : α → α'} {i : α'} (a : β) (h : ∀ x, f x ≠ i) : update g i a ∘ f = g ∘ f := update_comp_eq_of_forall_ne' g a h theorem update_comp_eq_of_injective' (g : ∀ a, β a) {f : α' → α} (hf : Function.Injective f) (i : α') (a : β (f i)) : (fun j ↦ update g (f i) a (f j)) = update (fun i ↦ g (f i)) i a := eq_update_iff.2 ⟨update_self .., fun _ hj ↦ update_of_ne (hf.ne hj) _ _⟩ theorem update_apply_of_injective (g : ∀ a, β a) {f : α' → α} (hf : Function.Injective f) (i : α') (a : β (f i)) (j : α') : update g (f i) a (f j) = update (fun i ↦ g (f i)) i a j := congr_fun (update_comp_eq_of_injective' g hf i a) j /-- Non-dependent version of `Function.update_comp_eq_of_injective'` -/ theorem update_comp_eq_of_injective {β : Sort} (g : α' → β) {f : α → α'} (hf : Function.Injective f) (i : α) (a : β) : Function.update g (f i) a ∘ f = Function.update (g ∘ f) i a := update_comp_eq_of_injective' g hf i a /-- Recursors can be pushed inside `Function.update`. The `ctor` argument should be a one-argument constructor like `Sum.inl`, and `recursor` should be an inductive recursor partially applied in all but that constructor, such as `(Sum.rec · g)`. In future, we should build some automation to generate applications like `Option.rec_update` for all inductive types. -/ lemma rec_update {ι κ : Sort} {α : κ → Sort} [DecidableEq ι] [DecidableEq κ] {ctor : ι → κ} (hctor : Function.Injective ctor) (recursor : ((i : ι) → α (ctor i)) → ((i : κ) → α i)) (h : ∀ f i, recursor f (ctor i) = f i) (h2 : ∀ f₁ f₂ k, (∀ i, ctor i ≠ k) → recursor f₁ k = recursor f₂ k) (f : (i : ι) → α (ctor i)) (i : ι) (x : α (ctor i)) : recursor (update f i x) = update (recursor f) (ctor i) x := by ext k by_cases h : ∃ i, ctor i = k · obtain ⟨i', rfl⟩ := h obtain rfl \| hi := eq_or_ne i' i · simp [h] · have hk := hctor.ne hi simp [h, hi, hk, Function.update_of_ne] · rw [not_exists] at h rw [h2 _ f _ h] rw [Function.update_of_ne (Ne.symm <\| h i)] @[simp] lemma _root_.Option.rec_update {α : Type} {β : Option α → Sort} [DecidableEq α] (f : β none) (g : ∀ a, β (.some a)) (a : α) (x : β (.some a)) : Option.rec f (update g a x) = update (Option.rec f g) (.some a) x := Function.rec_update (@Option.some.inj _) (Option.rec f) (fun _ _ => rfl) (fun \| _, _, .some _, h => (h _ rfl).elim \| _, _, .none, _ => rfl) _ _ _ theorem apply_update {ι : Sort} [DecidableEq ι] {α β : ι → Sort} (f : ∀ i, α i → β i) (g : ∀ i, α i) (i : ι) (v : α i) (j : ι) : f j (update g i v j) = update (fun k ↦ f k (g k)) i (f i v) j := by by_cases h : j = i · subst j simp · simp [h] theorem apply_update₂ {ι : Sort} [DecidableEq ι] {α β γ : ι → Sort} (f : ∀ i, α i → β i → γ i) (g : ∀ i, α i) (h : ∀ i, β i) (i : ι) (v : α i) (w : β i) (j : ι) : f j (update g i v j) (update h i w j) = update (fun k ↦ f k (g k) (h k)) i (f i v w) j := by by_cases h : j = i · subst j simp · simp [h] theorem pred_update (P : ∀ ⦃a⦄, β a → Prop) (f : ∀ a, β a) (a' : α) (v : β a') (a : α) : P (update f a' v a) ↔ a = a' ∧ P v ∨ a ≠ a' ∧ P (f a) := by rw [apply_update P, update_apply, ite_prop_iff_or] theorem comp_update {α' : Sort} {β : Sort} (f : α' → β) (g : α → α') (i : α) (v : α') : f ∘ update g i v = update (f ∘ g) i (f v) := funext <\| apply_update _ _ _ _ theorem update_comm {α} [DecidableEq α] {β : α → Sort} {a b : α} (h : a ≠ b) (v : β a) (w : β b) (f : ∀ a, β a) : update (update f a v) b w = update (update f b w) a v := by funext c simp only [update] by_cases h₁ : c = b <;> by_cases h₂ : c = a · rw [dif_pos h₁, dif_pos h₂] cases h (h₂.symm.trans h₁) · rw [dif_pos h₁, dif_pos h₁, dif_neg h₂] · rw [dif_neg h₁, dif_neg h₁] · rw [dif_neg h₁, dif_neg h₁] @[simp] theorem update_idem {α} [DecidableEq α] {β : α → Sort} {a : α} (v w : β a) (f : ∀ a, β a) : update (update f a v) a w = update f a w := by funext b by_cases h : b = a <;> simp [update, h] end Update noncomputable section Extend variable {α β γ : Sort} {f : α → β} /-- Extension of a function `g : α → γ` along a function `f : α → β`. For every `a : α`, `f a` is sent to `g a`. `f` might not be surjective, so we use an auxiliary function `j : β → γ` by sending `b : β` not in the range of `f` to `j b`. If you do not care about the behavior outside the range, `j` can be used as a junk value by setting it to be `0` or `Classical.arbitrary` (assuming `γ` is nonempty). This definition is mathematically meaningful only when `f a₁ = f a₂ → g a₁ = g a₂` (spelled `g.FactorsThrough f`). In particular this holds if `f` is injective. A typical use case is extending a function from a subtype to the entire type. If you wish to extend `g : {b : β // p b} → γ` to a function `β → γ`, you should use `Function.extend Subtype.val g j`. -/ def extend (f : α → β) (g : α → γ) (j : β → γ) : β → γ := fun b ↦ open scoped Classical in if h : ∃ a, f a = b then g (Classical.choose h) else j b /-- g factors through f : `f a = f b → g a = g b` -/ def FactorsThrough (g : α → γ) (f : α → β) : Prop := ∀ ⦃a b⦄, f a = f b → g a = g b theorem extend_def (f : α → β) (g : α → γ) (e' : β → γ) (b : β) [Decidable (∃ a, f a = b)] : extend f g e' b = if h : ∃ a, f a = b then g (Classical.choose h) else e' b := by unfold extend congr lemma Injective.factorsThrough (hf : Injective f) (g : α → γ) : g.FactorsThrough f := fun _ _ h => congr_arg g (hf h) lemma FactorsThrough.extend_apply {g : α → γ} (hf : g.FactorsThrough f) (e' : β → γ) (a : α) : extend f g e' (f a) = g a := by classical simp only [extend_def, dif_pos, exists_apply_eq_apply] exact hf (Classical.choose_spec (exists_apply_eq_apply f a)) @[simp] theorem Injective.extend_apply (hf : Injective f) (g : α → γ) (e' : β → γ) (a : α) : extend f g e' (f a) = g a := (hf.factorsThrough g).extend_apply e' a @[simp] theorem extend_apply' (g : α → γ) (e' : β → γ) (b : β) (hb : ¬∃ a, f a = b) : extend f g e' b = e' b := by classical simp [Function.extend_def, hb] lemma factorsThrough_iff (g : α → γ) [Nonempty γ] : g.FactorsThrough f ↔ ∃ (e : β → γ), g = e ∘ f := ⟨fun hf => ⟨extend f g (const β (Classical.arbitrary γ)), funext (fun x => by simp only [comp_apply, hf.extend_apply])⟩, fun h _ _ hf => by rw [Classical.choose_spec h, comp_apply, comp_apply, hf]⟩ lemma apply_extend {δ} {g : α → γ} (F : γ → δ) (f : α → β) (e' : β → γ) (b : β) : F (extend f g e' b) = extend f (F ∘ g) (F ∘ e') b := open scoped Classical in apply_dite F _ _ _ theorem extend_injective (hf : Injective f) (e' : β → γ) : Injective fun g ↦ extend f g e' := by intro g₁ g₂ hg refine funext fun x ↦ ?_ have H := congr_fun hg (f x) simp only [hf.extend_apply] at H exact H lemma FactorsThrough.extend_comp {g : α → γ} (e' : β → γ) (hf : FactorsThrough g f) : extend f g e' ∘ f = g := funext fun a => hf.extend_apply e' a @[simp] lemma extend_const (f : α → β) (c : γ) : extend f (fun _ ↦ c) (fun _ ↦ c) = fun _ ↦ c := funext fun _ ↦ open scoped Classical in ite_id _ @[simp] theorem extend_comp (hf : Injective f) (g : α → γ) (e' : β → γ) : extend f g e' ∘ f = g := funext fun a ↦ hf.extend_apply g e' a theorem Injective.surjective_comp_right' (hf : Injective f) (g₀ : β → γ) : Surjective fun g : β → γ ↦ g ∘ f := fun g ↦ ⟨extend f g g₀, extend_comp hf _ _⟩ theorem Injective.surjective_comp_right [Nonempty γ] (hf : Injective f) : Surjective fun g : β → γ ↦ g ∘ f := hf.surjective_comp_right' fun _ ↦ Classical.choice ‹_› theorem surjective_comp_right_iff_injective {γ : Type*} [Nontrivial γ] : Surjective (fun g : β → γ ↦ g ∘ f) ↔ Injective f := by classical refine ⟨not_imp_not.mp fun not_inj surj ↦ not_subsingleton γ ⟨fun c c' ↦ ?_⟩, (·.surjective_comp_right)⟩ simp only [Injective, not_forall] at not_inj have ⟨a₁, a₂, eq, ne⟩ := not_inj have ⟨f, hf⟩ := surj (if · = a₂ then c else c') have h₁ := congr_fun hf a₁ have h₂ := congr_fun hf a₂ simp only [comp_apply, if_neg ne, reduceIte] at h₁ h₂ rw [← h₁, eq, h₂] theorem Bijective.comp_right (hf : Bijective f) : Bijective fun g : β → γ ↦ g ∘ f := ⟨hf.surjective.injective_comp_right, fun g ↦ ⟨g ∘ surjInv hf.surjective, by simp only [comp_assoc g _ f, (leftInverse_surjInv hf).comp_eq_id, comp_id]⟩⟩ end Extend	namespace FactorsThrough protected theorem rfl {α β : Sort*} {f : α → β} : FactorsThrough f f := fun _ _ ↦ id	Mathlib/Logic/Function/Basic.lean	754	757
/- Copyright (c) 2022 Joël Riou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joël Riou -/ import Mathlib.CategoryTheory.Functor.ReflectsIso.Basic import Mathlib.CategoryTheory.MorphismProperty.Basic /-! # Morphism properties that are inverted by a functor In this file, we introduce the predicate `P.IsInvertedBy F` which expresses that the morphisms satisfying `P : MorphismProperty C` are mapped to isomorphisms by a functor `F : C ⥤ D`. This is used in the localization of categories API (folder `CategoryTheory.Localization`). -/ universe w v v' u u' namespace CategoryTheory namespace MorphismProperty variable {C : Type u} [Category.{v} C] {D : Type u'} [Category.{v'} D] /-- If `P : MorphismProperty C` and `F : C ⥤ D`, then `P.IsInvertedBy F` means that all morphisms in `P` are mapped by `F` to isomorphisms in `D`. -/ def IsInvertedBy (P : MorphismProperty C) (F : C ⥤ D) : Prop := ∀ ⦃X Y : C⦄ (f : X ⟶ Y) (_ : P f), IsIso (F.map f) namespace IsInvertedBy lemma of_le (P Q : MorphismProperty C) (F : C ⥤ D) (hQ : Q.IsInvertedBy F) (h : P ≤ Q) : P.IsInvertedBy F := fun _ _ _ hf => hQ _ (h _ hf) theorem of_comp {C₁ C₂ C₃ : Type*} [Category C₁] [Category C₂] [Category C₃]	(W : MorphismProperty C₁) (F : C₁ ⥤ C₂) (hF : W.IsInvertedBy F) (G : C₂ ⥤ C₃) : W.IsInvertedBy (F ⋙ G) := fun X Y f hf => by haveI := hF f hf dsimp infer_instance	Mathlib/CategoryTheory/MorphismProperty/IsInvertedBy.lean	41	46
/- 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.Algebra.Ring.Divisibility.Basic import Mathlib.Data.Ordering.Lemmas import Mathlib.Data.PNat.Basic import Mathlib.SetTheory.Ordinal.Principal import Mathlib.Tactic.NormNum /-! # Ordinal notation Constructive ordinal arithmetic for ordinals below `ε₀`. We define a type `ONote`, with constructors `0 : ONote` and `ONote.oadd e n a` representing `ω ^ e * n + a`. We say that `o` is in Cantor normal form - `ONote.NF o` - if either `o = 0` or `o = ω ^ e * n + a` with `a < ω ^ e` and `a` in Cantor normal form. The type `NONote` is the type of ordinals below `ε₀` in Cantor normal form. Various operations (addition, subtraction, multiplication, exponentiation) are defined on `ONote` and `NONote`. -/ open Ordinal Order -- The generated theorem `ONote.zero.sizeOf_spec` is flagged by `simpNF`, -- and we don't otherwise need it. set_option genSizeOfSpec false in /-- Recursive definition of an ordinal notation. `zero` denotes the ordinal 0, and `oadd e n a` is intended to refer to `ω ^ e * n + a`. For this to be a valid Cantor normal form, we must have the exponents decrease to the right, but we can't state this condition until we've defined `repr`, so we make it a separate definition `NF`. -/ inductive ONote : Type \| zero : ONote \| oadd : ONote → ℕ+ → ONote → ONote deriving DecidableEq compile_inductive% ONote namespace ONote /-- Notation for 0 -/ instance : Zero ONote := ⟨zero⟩ @[simp] theorem zero_def : zero = 0 := rfl instance : Inhabited ONote := ⟨0⟩ /-- Notation for 1 -/ instance : One ONote := ⟨oadd 0 1 0⟩ /-- Notation for ω -/ def omega : ONote := oadd 1 1 0 /-- The ordinal denoted by a notation -/ noncomputable def repr : ONote → Ordinal.{0} \| 0 => 0 \| oadd e n a => ω ^ repr e * n + repr a @[simp] theorem repr_zero : repr 0 = 0 := rfl attribute [simp] repr.eq_1 repr.eq_2 /-- Print `ω^sn`, omitting `s` if `e = 0` or `e = 1`, and omitting `n` if `n = 1` -/ private def toString_aux (e : ONote) (n : ℕ) (s : String) : String := if e = 0 then toString n else (if e = 1 then "ω" else "ω^(" ++ s ++ ")") ++ if n = 1 then "" else "" ++ toString n /-- Print an ordinal notation -/ def toString : ONote → String \| zero => "0" \| oadd e n 0 => toString_aux e n (toString e) \| oadd e n a => toString_aux e n (toString e) ++ " + " ++ toString a open Lean in /-- Print an ordinal notation -/ def repr' (prec : ℕ) : ONote → Format \| zero => "0" \| oadd e n a => Repr.addAppParen ("oadd " ++ (repr' max_prec e) ++ " " ++ Nat.repr (n : ℕ) ++ " " ++ (repr' max_prec a)) prec instance : ToString ONote := ⟨toString⟩ instance : Repr ONote where reprPrec o prec := repr' prec o instance : Preorder ONote where le x y := repr x ≤ repr y lt x y := repr x < repr y le_refl _ := @le_refl Ordinal _ _ le_trans _ _ _ := @le_trans Ordinal _ _ _ _ lt_iff_le_not_le _ _ := @lt_iff_le_not_le Ordinal _ _ _ theorem lt_def {x y : ONote} : x < y ↔ repr x < repr y := Iff.rfl theorem le_def {x y : ONote} : x ≤ y ↔ repr x ≤ repr y := Iff.rfl instance : WellFoundedRelation ONote := ⟨(· < ·), InvImage.wf repr Ordinal.lt_wf⟩ /-- Convert a `Nat` into an ordinal -/ @[coe] def ofNat : ℕ → ONote \| 0 => 0 \| Nat.succ n => oadd 0 n.succPNat 0 -- Porting note (https://github.com/leanprover-community/mathlib4/pull/11467): during the port we marked these lemmas with `@[eqns]` -- to emulate the old Lean 3 behaviour. @[simp] theorem ofNat_zero : ofNat 0 = 0 := rfl @[simp] theorem ofNat_succ (n) : ofNat (Nat.succ n) = oadd 0 n.succPNat 0 := rfl instance (priority := low) nat (n : ℕ) : OfNat ONote n where ofNat := ofNat n @[simp 1200] theorem ofNat_one : ofNat 1 = 1 := rfl @[simp] theorem repr_ofNat (n : ℕ) : repr (ofNat n) = n := by cases n <;> simp @[simp] theorem repr_one : repr 1 = (1 : ℕ) := repr_ofNat 1 theorem omega0_le_oadd (e n a) : ω ^ repr e ≤ repr (oadd e n a) := by refine le_trans ?_ (le_add_right _ _) simpa using (Ordinal.mul_le_mul_iff_left <\| opow_pos (repr e) omega0_pos).2 (Nat.cast_le.2 n.2) theorem oadd_pos (e n a) : 0 < oadd e n a := @lt_of_lt_of_le _ _ _ (ω ^ repr e) _ (opow_pos (repr e) omega0_pos) (omega0_le_oadd e n a) /-- Comparison of ordinal notations: `ω ^ e₁ * n₁ + a₁` is less than `ω ^ e₂ * n₂ + a₂` when either `e₁ < e₂`, or `e₁ = e₂` and `n₁ < n₂`, or `e₁ = e₂`, `n₁ = n₂`, and `a₁ < a₂`. -/ def cmp : ONote → ONote → Ordering \| 0, 0 => Ordering.eq \| _, 0 => Ordering.gt \| 0, _ => Ordering.lt \| _o₁@(oadd e₁ n₁ a₁), _o₂@(oadd e₂ n₂ a₂) => (cmp e₁ e₂).then <\| (_root_.cmp (n₁ : ℕ) n₂).then (cmp a₁ a₂) theorem eq_of_cmp_eq : ∀ {o₁ o₂}, cmp o₁ o₂ = Ordering.eq → o₁ = o₂ \| 0, 0, _ => rfl \| oadd e n a, 0, h => by injection h \| 0, oadd e n a, h => by injection h \| oadd e₁ n₁ a₁, oadd e₂ n₂ a₂, h => by revert h; simp only [cmp] cases h₁ : cmp e₁ e₂ <;> intro h <;> try cases h obtain rfl := eq_of_cmp_eq h₁ revert h; cases h₂ : _root_.cmp (n₁ : ℕ) n₂ <;> intro h <;> try cases h obtain rfl := eq_of_cmp_eq h rw [_root_.cmp, cmpUsing_eq_eq, not_lt, not_lt, ← le_antisymm_iff] at h₂ obtain rfl := Subtype.eq h₂ simp protected theorem zero_lt_one : (0 : ONote) < 1 := by simp only [lt_def, repr_zero, repr_one, Nat.cast_one, zero_lt_one] /-- `NFBelow o b` says that `o` is a normal form ordinal notation satisfying `repr o < ω ^ b`. -/ inductive NFBelow : ONote → Ordinal.{0} → Prop \| zero {b} : NFBelow 0 b \| oadd' {e n a eb b} : NFBelow e eb → NFBelow a (repr e) → repr e < b → NFBelow (oadd e n a) b /-- A normal form ordinal notation has the form `ω ^ a₁ * n₁ + ω ^ a₂ * n₂ + ⋯ + ω ^ aₖ * nₖ` where `a₁ > a₂ > ⋯ > aₖ` and all the `aᵢ` are also in normal form. We will essentially only be interested in normal form ordinal notations, but to avoid complicating the algorithms, we define everything over general ordinal notations and only prove correctness with normal form as an invariant. -/ class NF (o : ONote) : Prop where out : Exists (NFBelow o) instance NF.zero : NF 0 := ⟨⟨0, NFBelow.zero⟩⟩ theorem NFBelow.oadd {e n a b} : NF e → NFBelow a (repr e) → repr e < b → NFBelow (oadd e n a) b \| ⟨⟨_, h⟩⟩ => NFBelow.oadd' h theorem NFBelow.fst {e n a b} (h : NFBelow (ONote.oadd e n a) b) : NF e := by obtain - \| ⟨h₁, h₂, h₃⟩ := h; exact ⟨⟨_, h₁⟩⟩ theorem NF.fst {e n a} : NF (oadd e n a) → NF e \| ⟨⟨_, h⟩⟩ => h.fst theorem NFBelow.snd {e n a b} (h : NFBelow (ONote.oadd e n a) b) : NFBelow a (repr e) := by obtain - \| ⟨h₁, h₂, h₃⟩ := h; exact h₂ theorem NF.snd' {e n a} : NF (oadd e n a) → NFBelow a (repr e) \| ⟨⟨_, h⟩⟩ => h.snd theorem NF.snd {e n a} (h : NF (oadd e n a)) : NF a := ⟨⟨_, h.snd'⟩⟩ theorem NF.oadd {e a} (h₁ : NF e) (n) (h₂ : NFBelow a (repr e)) : NF (oadd e n a) := ⟨⟨_, NFBelow.oadd h₁ h₂ (lt_succ _)⟩⟩ instance NF.oadd_zero (e n) [h : NF e] : NF (ONote.oadd e n 0) := h.oadd _ NFBelow.zero theorem NFBelow.lt {e n a b} (h : NFBelow (ONote.oadd e n a) b) : repr e < b := by obtain - \| ⟨h₁, h₂, h₃⟩ := h; exact h₃ theorem NFBelow_zero : ∀ {o}, NFBelow o 0 ↔ o = 0 \| 0 => ⟨fun _ => rfl, fun _ => NFBelow.zero⟩ \| oadd _ _ _ => ⟨fun h => (not_le_of_lt h.lt).elim (Ordinal.zero_le _), fun e => e.symm ▸ NFBelow.zero⟩ theorem NF.zero_of_zero {e n a} (h : NF (ONote.oadd e n a)) (e0 : e = 0) : a = 0 := by simpa [e0, NFBelow_zero] using h.snd' theorem NFBelow.repr_lt {o b} (h : NFBelow o b) : repr o < ω ^ b := by induction h with \| zero => exact opow_pos _ omega0_pos \| oadd' _ _ h₃ _ IH => rw [repr] apply ((add_lt_add_iff_left _).2 IH).trans_le rw [← mul_succ] apply (mul_le_mul_left' (succ_le_of_lt (nat_lt_omega0 _)) _).trans rw [← opow_succ] exact opow_le_opow_right omega0_pos (succ_le_of_lt h₃) theorem NFBelow.mono {o b₁ b₂} (bb : b₁ ≤ b₂) (h : NFBelow o b₁) : NFBelow o b₂ := by induction h with \| zero => exact zero \| oadd' h₁ h₂ h₃ _ _ => constructor; exacts [h₁, h₂, lt_of_lt_of_le h₃ bb] theorem NF.below_of_lt {e n a b} (H : repr e < b) : NF (ONote.oadd e n a) → NFBelow (ONote.oadd e n a) b \| ⟨⟨b', h⟩⟩ => by (obtain - \| ⟨h₁, h₂, h₃⟩ := h; exact NFBelow.oadd' h₁ h₂ H) theorem NF.below_of_lt' : ∀ {o b}, repr o < ω ^ b → NF o → NFBelow o b \| 0, _, _, _ => NFBelow.zero \| ONote.oadd _ _ _, _, H, h => h.below_of_lt <\| (opow_lt_opow_iff_right one_lt_omega0).1 <\| lt_of_le_of_lt (omega0_le_oadd _ _ _) H theorem nfBelow_ofNat : ∀ n, NFBelow (ofNat n) 1 \| 0 => NFBelow.zero \| Nat.succ _ => NFBelow.oadd NF.zero NFBelow.zero zero_lt_one instance nf_ofNat (n) : NF (ofNat n) := ⟨⟨_, nfBelow_ofNat n⟩⟩ instance nf_one : NF 1 := by rw [← ofNat_one]; infer_instance theorem oadd_lt_oadd_1 {e₁ n₁ o₁ e₂ n₂ o₂} (h₁ : NF (oadd e₁ n₁ o₁)) (h : e₁ < e₂) : oadd e₁ n₁ o₁ < oadd e₂ n₂ o₂ := @lt_of_lt_of_le _ _ (repr (oadd e₁ n₁ o₁)) _ _ (NF.below_of_lt h h₁).repr_lt (omega0_le_oadd e₂ n₂ o₂) theorem oadd_lt_oadd_2 {e o₁ o₂ : ONote} {n₁ n₂ : ℕ+} (h₁ : NF (oadd e n₁ o₁)) (h : (n₁ : ℕ) < n₂) : oadd e n₁ o₁ < oadd e n₂ o₂ := by simp only [lt_def, repr] refine lt_of_lt_of_le ((add_lt_add_iff_left _).2 h₁.snd'.repr_lt) (le_trans ?_ (le_add_right _ _)) rwa [← mul_succ,Ordinal.mul_le_mul_iff_left (opow_pos _ omega0_pos), succ_le_iff, Nat.cast_lt] theorem oadd_lt_oadd_3 {e n a₁ a₂} (h : a₁ < a₂) : oadd e n a₁ < oadd e n a₂ := by rw [lt_def]; unfold repr exact @add_lt_add_left _ _ _ _ (repr a₁) _ h _ theorem cmp_compares : ∀ (a b : ONote) [NF a] [NF b], (cmp a b).Compares a b \| 0, 0, _, _ => rfl \| oadd _ _ _, 0, _, _ => oadd_pos _ _ _ \| 0, oadd _ _ _, _, _ => oadd_pos _ _ _ \| o₁@(oadd e₁ n₁ a₁), o₂@(oadd e₂ n₂ a₂), h₁, h₂ => by -- TODO: golf rw [cmp] have IHe := @cmp_compares _ _ h₁.fst h₂.fst simp only [Ordering.Compares, gt_iff_lt] at IHe; revert IHe cases cmp e₁ e₂ case lt => intro IHe; exact oadd_lt_oadd_1 h₁ IHe case gt => intro IHe; exact oadd_lt_oadd_1 h₂ IHe case eq => intro IHe; dsimp at IHe; subst IHe unfold _root_.cmp; cases nh : cmpUsing (· < ·) (n₁ : ℕ) n₂ <;> rw [cmpUsing, ite_eq_iff, not_lt] at nh case lt => rcases nh with nh \| nh · exact oadd_lt_oadd_2 h₁ nh.left · rw [ite_eq_iff] at nh; rcases nh.right with nh \| nh <;> cases nh <;> contradiction case gt => rcases nh with nh \| nh · cases nh; contradiction · obtain ⟨_, nh⟩ := nh rw [ite_eq_iff] at nh; rcases nh with nh \| nh · exact oadd_lt_oadd_2 h₂ nh.left · cases nh; contradiction rcases nh with nh \| nh · cases nh; contradiction obtain ⟨nhl, nhr⟩ := nh rw [ite_eq_iff] at nhr rcases nhr with nhr \| nhr · cases nhr; contradiction obtain rfl := Subtype.eq (nhl.eq_of_not_lt nhr.1) have IHa := @cmp_compares _ _ h₁.snd h₂.snd revert IHa; cases cmp a₁ a₂ <;> intro IHa <;> dsimp at IHa case lt => exact oadd_lt_oadd_3 IHa case gt => exact oadd_lt_oadd_3 IHa subst IHa; exact rfl theorem repr_inj {a b} [NF a] [NF b] : repr a = repr b ↔ a = b := ⟨fun e => match cmp a b, cmp_compares a b with \| Ordering.lt, (h : repr a < repr b) => (ne_of_lt h e).elim \| Ordering.gt, (h : repr a > repr b)=> (ne_of_gt h e).elim \| Ordering.eq, h => h, congr_arg _⟩ theorem NF.of_dvd_omega0_opow {b e n a} (h : NF (ONote.oadd e n a)) (d : ω ^ b ∣ repr (ONote.oadd e n a)) : b ≤ repr e ∧ ω ^ b ∣ repr a := by have := mt repr_inj.1 (fun h => by injection h : ONote.oadd e n a ≠ 0) have L := le_of_not_lt fun l => not_le_of_lt (h.below_of_lt l).repr_lt (le_of_dvd this d) simp only [repr] at d exact ⟨L, (dvd_add_iff <\| (opow_dvd_opow _ L).mul_right _).1 d⟩ theorem NF.of_dvd_omega0 {e n a} (h : NF (ONote.oadd e n a)) : ω ∣ repr (ONote.oadd e n a) → repr e ≠ 0 ∧ ω ∣ repr a := by (rw [← opow_one ω, ← one_le_iff_ne_zero]; exact h.of_dvd_omega0_opow) /-- `TopBelow b o` asserts that the largest exponent in `o`, if it exists, is less than `b`. This is an auxiliary definition for decidability of `NF`. -/ def TopBelow (b : ONote) : ONote → Prop \| 0 => True \| oadd e _ _ => cmp e b = Ordering.lt instance decidableTopBelow : DecidableRel TopBelow := by intro b o cases o <;> delta TopBelow <;> infer_instance theorem nfBelow_iff_topBelow {b} [NF b] : ∀ {o}, NFBelow o (repr b) ↔ NF o ∧ TopBelow b o \| 0 => ⟨fun h => ⟨⟨⟨_, h⟩⟩, trivial⟩, fun _ => NFBelow.zero⟩ \| oadd _ _ _ => ⟨fun h => ⟨⟨⟨_, h⟩⟩, (@cmp_compares _ b h.fst _).eq_lt.2 h.lt⟩, fun ⟨h₁, h₂⟩ => h₁.below_of_lt <\| (@cmp_compares _ b h₁.fst _).eq_lt.1 h₂⟩ instance decidableNF : DecidablePred NF \| 0 => isTrue NF.zero \| oadd e n a => by have := decidableNF e have := decidableNF a apply decidable_of_iff (NF e ∧ NF a ∧ TopBelow e a) rw [← and_congr_right fun h => @nfBelow_iff_topBelow _ h _] exact ⟨fun ⟨h₁, h₂⟩ => NF.oadd h₁ n h₂, fun h => ⟨h.fst, h.snd'⟩⟩ /-- Auxiliary definition for `add` -/ def addAux (e : ONote) (n : ℕ+) (o : ONote) : ONote := match o with \| 0 => oadd e n 0 \| o'@(oadd e' n' a') => match cmp e e' with \| Ordering.lt => o' \| Ordering.eq => oadd e (n + n') a' \| Ordering.gt => oadd e n o' /-- Addition of ordinal notations (correct only for normal input) -/ def add : ONote → ONote → ONote \| 0, o => o \| oadd e n a, o => addAux e n (add a o) instance : Add ONote := ⟨add⟩ @[simp] theorem zero_add (o : ONote) : 0 + o = o := rfl theorem oadd_add (e n a o) : oadd e n a + o = addAux e n (a + o) := rfl /-- Subtraction of ordinal notations (correct only for normal input) -/ def sub : ONote → ONote → ONote \| 0, _ => 0 \| o, 0 => o \| o₁@(oadd e₁ n₁ a₁), oadd e₂ n₂ a₂ => match cmp e₁ e₂ with \| Ordering.lt => 0 \| Ordering.gt => o₁ \| Ordering.eq => match (n₁ : ℕ) - n₂ with \| 0 => if n₁ = n₂ then sub a₁ a₂ else 0 \| Nat.succ k => oadd e₁ k.succPNat a₁ instance : Sub ONote := ⟨sub⟩ theorem add_nfBelow {b} : ∀ {o₁ o₂}, NFBelow o₁ b → NFBelow o₂ b → NFBelow (o₁ + o₂) b \| 0, _, _, h₂ => h₂ \| oadd e n a, o, h₁, h₂ => by have h' := add_nfBelow (h₁.snd.mono <\| le_of_lt h₁.lt) h₂ simp only [oadd_add]; revert h'; obtain - \| ⟨e', n', a'⟩ := a + o <;> intro h' · exact NFBelow.oadd h₁.fst NFBelow.zero h₁.lt have : ((e.cmp e').Compares e e') := @cmp_compares _ _ h₁.fst h'.fst cases h : cmp e e' <;> dsimp [addAux] <;> simp only [h] · exact h' · simp only [h] at this subst e' exact NFBelow.oadd h'.fst h'.snd h'.lt · simp only [h] at this exact NFBelow.oadd h₁.fst (NF.below_of_lt this ⟨⟨_, h'⟩⟩) h₁.lt instance add_nf (o₁ o₂) : ∀ [NF o₁] [NF o₂], NF (o₁ + o₂) \| ⟨⟨b₁, h₁⟩⟩, ⟨⟨b₂, h₂⟩⟩ => ⟨(le_total b₁ b₂).elim (fun h => ⟨b₂, add_nfBelow (h₁.mono h) h₂⟩) fun h => ⟨b₁, add_nfBelow h₁ (h₂.mono h)⟩⟩ @[simp] theorem repr_add : ∀ (o₁ o₂) [NF o₁] [NF o₂], repr (o₁ + o₂) = repr o₁ + repr o₂ \| 0, o, _, _ => by simp \| oadd e n a, o, h₁, h₂ => by haveI := h₁.snd; have h' := repr_add a o conv_lhs at h' => simp [HAdd.hAdd, Add.add] have nf := ONote.add_nf a o conv at nf => simp [HAdd.hAdd, Add.add] conv in _ + o => simp [HAdd.hAdd, Add.add] rcases h : add a o with - \| ⟨e', n', a'⟩ <;> simp only [Add.add, add, addAux, h'.symm, h, add_assoc, repr_zero, repr] at nf h₁ ⊢ have := h₁.fst; haveI := nf.fst; have ee := cmp_compares e e' cases he : cmp e e' <;> simp only [he, Ordering.compares_gt, Ordering.compares_lt, Ordering.compares_eq, repr, gt_iff_lt, PNat.add_coe, Nat.cast_add] at ee ⊢ · rw [← add_assoc, @add_absorp _ (repr e') (ω ^ repr e' * (n' : ℕ))] · have := (h₁.below_of_lt ee).repr_lt unfold repr at this cases he' : e' <;> simp only [he', zero_def, opow_zero, repr, gt_iff_lt] at this ⊢ <;> exact lt_of_le_of_lt (le_add_right _ _) this · simpa using (Ordinal.mul_le_mul_iff_left <\| opow_pos (repr e') omega0_pos).2 (Nat.cast_le.2 n'.pos) · rw [ee, ← add_assoc, ← mul_add] theorem sub_nfBelow : ∀ {o₁ o₂ b}, NFBelow o₁ b → NF o₂ → NFBelow (o₁ - o₂) b \| 0, o, b, _, h₂ => by cases o <;> exact NFBelow.zero \| oadd _ _ _, 0, _, h₁, _ => h₁ \| oadd e₁ n₁ a₁, oadd e₂ n₂ a₂, b, h₁, h₂ => by have h' := sub_nfBelow h₁.snd h₂.snd simp only [HSub.hSub, Sub.sub, sub] at h' ⊢ have := @cmp_compares _ _ h₁.fst h₂.fst cases h : cmp e₁ e₂ · apply NFBelow.zero · rw [Nat.sub_eq] simp only [h, Ordering.compares_eq] at this subst e₂ cases (n₁ : ℕ) - n₂ · by_cases en : n₁ = n₂ <;> simp only [en, ↓reduceIte] · exact h'.mono (le_of_lt h₁.lt) · exact NFBelow.zero · exact NFBelow.oadd h₁.fst h₁.snd h₁.lt · exact h₁ instance sub_nf (o₁ o₂) : ∀ [NF o₁] [NF o₂], NF (o₁ - o₂) \| ⟨⟨b₁, h₁⟩⟩, h₂ => ⟨⟨b₁, sub_nfBelow h₁ h₂⟩⟩ @[simp] theorem repr_sub : ∀ (o₁ o₂) [NF o₁] [NF o₂], repr (o₁ - o₂) = repr o₁ - repr o₂ \| 0, o, _, h₂ => by cases o <;> exact (Ordinal.zero_sub _).symm \| oadd _ _ _, 0, _, _ => (Ordinal.sub_zero _).symm \| oadd e₁ n₁ a₁, oadd e₂ n₂ a₂, h₁, h₂ => by haveI := h₁.snd; haveI := h₂.snd; have h' := repr_sub a₁ a₂ conv_lhs at h' => dsimp [HSub.hSub, Sub.sub, sub] conv_lhs => dsimp only [HSub.hSub, Sub.sub]; dsimp only [sub] have ee := @cmp_compares _ _ h₁.fst h₂.fst cases h : cmp e₁ e₂ <;> simp only [h] at ee · rw [Ordinal.sub_eq_zero_iff_le.2] · rfl exact le_of_lt (oadd_lt_oadd_1 h₁ ee) · change e₁ = e₂ at ee subst e₂ dsimp only cases mn : (n₁ : ℕ) - n₂ <;> dsimp only · by_cases en : n₁ = n₂ · simpa [en] · simp only [en, ite_false] exact (Ordinal.sub_eq_zero_iff_le.2 <\| le_of_lt <\| oadd_lt_oadd_2 h₁ <\| lt_of_le_of_ne (tsub_eq_zero_iff_le.1 mn) (mt PNat.eq en)).symm · simp [Nat.succPNat] rw [(tsub_eq_iff_eq_add_of_le <\| le_of_lt <\| Nat.lt_of_sub_eq_succ mn).1 mn, add_comm, Nat.cast_add, mul_add, add_assoc, add_sub_add_cancel] refine (Ordinal.sub_eq_of_add_eq <\| add_absorp h₂.snd'.repr_lt <\| le_trans ?_ (le_add_right _ _)).symm exact Ordinal.le_mul_left _ (Nat.cast_lt.2 <\| Nat.succ_pos _) · exact (Ordinal.sub_eq_of_add_eq <\| add_absorp (h₂.below_of_lt ee).repr_lt <\| omega0_le_oadd _ _ _).symm /-- Multiplication of ordinal notations (correct only for normal input) -/ def mul : ONote → ONote → ONote \| 0, _ => 0 \| _, 0 => 0 \| o₁@(oadd e₁ n₁ a₁), oadd e₂ n₂ a₂ => if e₂ = 0 then oadd e₁ (n₁ * n₂) a₁ else oadd (e₁ + e₂) n₂ (mul o₁ a₂) instance : Mul ONote := ⟨mul⟩ instance : MulZeroClass ONote where mul := (· * ·) zero := 0 zero_mul o := by cases o <;> rfl mul_zero o := by cases o <;> rfl theorem oadd_mul (e₁ n₁ a₁ e₂ n₂ a₂) : oadd e₁ n₁ a₁ * oadd e₂ n₂ a₂ = if e₂ = 0 then oadd e₁ (n₁ * n₂) a₁ else oadd (e₁ + e₂) n₂ (oadd e₁ n₁ a₁ * a₂) := rfl theorem oadd_mul_nfBelow {e₁ n₁ a₁ b₁} (h₁ : NFBelow (oadd e₁ n₁ a₁) b₁) : ∀ {o₂ b₂}, NFBelow o₂ b₂ → NFBelow (oadd e₁ n₁ a₁ * o₂) (repr e₁ + b₂) \| 0, _, _ => NFBelow.zero \| oadd e₂ n₂ a₂, b₂, h₂ => by have IH := oadd_mul_nfBelow h₁ h₂.snd by_cases e0 : e₂ = 0 <;> simp only [e0, oadd_mul, ↓reduceIte] · apply NFBelow.oadd h₁.fst h₁.snd simpa using (add_lt_add_iff_left (repr e₁)).2 (lt_of_le_of_lt (Ordinal.zero_le _) h₂.lt) · haveI := h₁.fst haveI := h₂.fst apply NFBelow.oadd · infer_instance · rwa [repr_add] · rw [repr_add, add_lt_add_iff_left] exact h₂.lt instance mul_nf : ∀ (o₁ o₂) [NF o₁] [NF o₂], NF (o₁ * o₂) \| 0, o, _, h₂ => by cases o <;> exact NF.zero \| oadd _ _ _, _, ⟨⟨_, hb₁⟩⟩, ⟨⟨_, hb₂⟩⟩ => ⟨⟨_, oadd_mul_nfBelow hb₁ hb₂⟩⟩ @[simp] theorem repr_mul : ∀ (o₁ o₂) [NF o₁] [NF o₂], repr (o₁ * o₂) = repr o₁ * repr o₂ \| 0, o, _, h₂ => by cases o <;> exact (zero_mul _).symm \| oadd _ _ _, 0, _, _ => (mul_zero _).symm \| oadd e₁ n₁ a₁, oadd e₂ n₂ a₂, h₁, h₂ => by have IH : repr (mul _ _) = _ := @repr_mul _ _ h₁ h₂.snd conv => lhs simp [(· * ·)] have ao : repr a₁ + ω ^ repr e₁ * (n₁ : ℕ) = ω ^ repr e₁ * (n₁ : ℕ) := by apply add_absorp h₁.snd'.repr_lt simpa using (Ordinal.mul_le_mul_iff_left <\| opow_pos _ omega0_pos).2 (Nat.cast_le.2 n₁.2) by_cases e0 : e₂ = 0 · obtain ⟨x, xe⟩ := Nat.exists_eq_succ_of_ne_zero n₂.ne_zero simp only [Mul.mul, mul, e0, ↓reduceIte, repr, PNat.mul_coe, natCast_mul, opow_zero, one_mul] simp only [xe, h₂.zero_of_zero e0, repr, add_zero] rw [natCast_succ x, add_mul_succ _ ao, mul_assoc] · simp only [repr] haveI := h₁.fst haveI := h₂.fst simp only [Mul.mul, mul, e0, ite_false, repr.eq_2, repr_add, opow_add, IH, repr, mul_add] rw [← mul_assoc] congr 2 have := mt repr_inj.1 e0 rw [add_mul_limit ao (isLimit_opow_left isLimit_omega0 this), mul_assoc, mul_omega0_dvd (Nat.cast_pos'.2 n₁.pos) (nat_lt_omega0 _)] simpa using opow_dvd_opow ω (one_le_iff_ne_zero.2 this) /-- Calculate division and remainder of `o` mod `ω`: `split' o = (a, n)` means `o = ω * a + n`. -/ def split' : ONote → ONote × ℕ \| 0 => (0, 0) \| oadd e n a => if e = 0 then (0, n) else let (a', m) := split' a (oadd (e - 1) n a', m) /-- Calculate division and remainder of `o` mod `ω`: `split o = (a, n)` means `o = a + n`, where `ω ∣ a`. -/ def split : ONote → ONote × ℕ \| 0 => (0, 0) \| oadd e n a => if e = 0 then (0, n) else let (a', m) := split a (oadd e n a', m) /-- `scale x o` is the ordinal notation for `ω ^ x * o`. -/ def scale (x : ONote) : ONote → ONote \| 0 => 0 \| oadd e n a => oadd (x + e) n (scale x a) /-- `mulNat o n` is the ordinal notation for `o * n`. -/ def mulNat : ONote → ℕ → ONote \| 0, _ => 0 \| _, 0 => 0 \| oadd e n a, m + 1 => oadd e (n * m.succPNat) a /-- Auxiliary definition to compute the ordinal notation for the ordinal exponentiation in `opow` -/ def opowAux (e a0 a : ONote) : ℕ → ℕ → ONote \| _, 0 => 0 \| 0, m + 1 => oadd e m.succPNat 0 \| k + 1, m => scale (e + mulNat a0 k) a + (opowAux e a0 a k m) /-- Auxiliary definition to compute the ordinal notation for the ordinal exponentiation in `opow` -/ def opowAux2 (o₂ : ONote) (o₁ : ONote × ℕ) : ONote := match o₁ with \| (0, 0) => if o₂ = 0 then 1 else 0 \| (0, 1) => 1 \| (0, m + 1) => let (b', k) := split' o₂ oadd b' (m.succPNat ^ k) 0 \| (a@(oadd a0 _ _), m) => match split o₂ with \| (b, 0) => oadd (a0 * b) 1 0 \| (b, k + 1) => let eb := a0 * b scale (eb + mulNat a0 k) a + opowAux eb a0 (mulNat a m) k m /-- `opow o₁ o₂` calculates the ordinal notation for the ordinal exponential `o₁ ^ o₂`. -/ def opow (o₁ o₂ : ONote) : ONote := opowAux2 o₂ (split o₁) instance : Pow ONote ONote := ⟨opow⟩ theorem opow_def (o₁ o₂ : ONote) : o₁ ^ o₂ = opowAux2 o₂ (split o₁) := rfl theorem split_eq_scale_split' : ∀ {o o' m} [NF o], split' o = (o', m) → split o = (scale 1 o', m) \| 0, o', m, _, p => by injection p; substs o' m; rfl \| oadd e n a, o', m, h, p => by by_cases e0 : e = 0 <;> simp only [split', e0, ↓reduceIte, Prod.mk.injEq, split] at p ⊢ · rcases p with ⟨rfl, rfl⟩ exact ⟨rfl, rfl⟩ · revert p rcases h' : split' a with ⟨a', m'⟩ haveI := h.fst haveI := h.snd simp only [split_eq_scale_split' h', and_imp] have : 1 + (e - 1) = e := by refine repr_inj.1 ?_ simp only [repr_add, repr_one, Nat.cast_one, repr_sub] have := mt repr_inj.1 e0 exact Ordinal.add_sub_cancel_of_le <\| one_le_iff_ne_zero.2 this intros substs o' m simp [scale, this] theorem nf_repr_split' : ∀ {o o' m} [NF o], split' o = (o', m) → NF o' ∧ repr o = ω * repr o' + m \| 0, o', m, _, p => by injection p; substs o' m; simp [NF.zero] \| oadd e n a, o', m, h, p => by by_cases e0 : e = 0 <;> simp [e0, split, split'] at p ⊢ · rcases p with ⟨rfl, rfl⟩ simp [h.zero_of_zero e0, NF.zero] · revert p rcases h' : split' a with ⟨a', m'⟩ haveI := h.fst haveI := h.snd obtain ⟨IH₁, IH₂⟩ := nf_repr_split' h' simp only [IH₂, and_imp] intros substs o' m have : (ω : Ordinal.{0}) ^ repr e = ω ^ (1 : Ordinal.{0}) * ω ^ (repr e - 1) := by have := mt repr_inj.1 e0 rw [← opow_add, Ordinal.add_sub_cancel_of_le (one_le_iff_ne_zero.2 this)] refine ⟨NF.oadd (by infer_instance) _ ?_, ?_⟩ · simp only [opow_one, repr_sub, repr_one, Nat.cast_one] at this ⊢ refine IH₁.below_of_lt' ((Ordinal.mul_lt_mul_iff_left omega0_pos).1 <\| lt_of_le_of_lt (le_add_right _ m') ?_) rw [← this, ← IH₂] exact h.snd'.repr_lt · rw [this] simp [mul_add, mul_assoc, add_assoc] theorem scale_eq_mul (x) [NF x] : ∀ (o) [NF o], scale x o = oadd x 1 0 * o \| 0, _ => rfl \| oadd e n a, h => by simp only [HMul.hMul]; simp only [scale] haveI := h.snd by_cases e0 : e = 0 · simp_rw [scale_eq_mul] simp [Mul.mul, mul, scale_eq_mul, e0, h.zero_of_zero, show x + 0 = x from repr_inj.1 (by simp)] · simp [e0, Mul.mul, mul, scale_eq_mul, (· * ·)] instance nf_scale (x) [NF x] (o) [NF o] : NF (scale x o) := by rw [scale_eq_mul] infer_instance @[simp] theorem repr_scale (x) [NF x] (o) [NF o] : repr (scale x o) = ω ^ repr x * repr o := by simp only [scale_eq_mul, repr_mul, repr, PNat.one_coe, Nat.cast_one, mul_one, add_zero] theorem nf_repr_split {o o' m} [NF o] (h : split o = (o', m)) : NF o' ∧ repr o = repr o' + m := by rcases e : split' o with ⟨a, n⟩ obtain ⟨s₁, s₂⟩ := nf_repr_split' e rw [split_eq_scale_split' e] at h injection h; substs o' n simp only [repr_scale, repr_one, Nat.cast_one, opow_one, ← s₂, and_true] infer_instance theorem split_dvd {o o' m} [NF o] (h : split o = (o', m)) : ω ∣ repr o' := by rcases e : split' o with ⟨a, n⟩ rw [split_eq_scale_split' e] at h injection h; subst o' cases nf_repr_split' e; simp theorem split_add_lt {o e n a m} [NF o] (h : split o = (oadd e n a, m)) : repr a + m < ω ^ repr e := by obtain ⟨h₁, h₂⟩ := nf_repr_split h obtain ⟨e0, d⟩ := h₁.of_dvd_omega0 (split_dvd h) apply principal_add_omega0_opow _ h₁.snd'.repr_lt (lt_of_lt_of_le (nat_lt_omega0 _) _) simpa using opow_le_opow_right omega0_pos (one_le_iff_ne_zero.2 e0) @[simp] theorem mulNat_eq_mul (n o) : mulNat o n = o * ofNat n := by cases o <;> cases n <;> rfl instance nf_mulNat (o) [NF o] (n) : NF (mulNat o n) := by simpa using ONote.mul_nf o (ofNat n) instance nf_opowAux (e a0 a) [NF e] [NF a0] [NF a] : ∀ k m, NF (opowAux e a0 a k m) := by intro k m unfold opowAux cases m with \| zero => cases k <;> exact NF.zero \| succ m => cases k with \| zero => exact NF.oadd_zero _ _ \| succ k => haveI := nf_opowAux e a0 a k simp only [Nat.succ_ne_zero m, IsEmpty.forall_iff, mulNat_eq_mul]; infer_instance instance nf_opow (o₁ o₂) [NF o₁] [NF o₂] : NF (o₁ ^ o₂) := by rcases e₁ : split o₁ with ⟨a, m⟩ have na := (nf_repr_split e₁).1 rcases e₂ : split' o₂ with ⟨b', k⟩ haveI := (nf_repr_split' e₂).1 obtain - \| ⟨a0, n, a'⟩ := a · rcases m with - \| m · by_cases o₂ = 0 <;> simp only [(· ^ ·), Pow.pow, opow, opowAux2, ] <;> decide · by_cases m = 0 · simp only [(· ^ ·), Pow.pow, opow, opowAux2, , zero_def] decide · simp only [(· ^ ·), Pow.pow, opow, opowAux2, mulNat_eq_mul, ofNat, ] infer_instance · simp only [(· ^ ·), Pow.pow, opow, opowAux2, e₁, split_eq_scale_split' e₂, mulNat_eq_mul] have := na.fst rcases k with - \| k · infer_instance · cases k <;> cases m <;> infer_instance theorem scale_opowAux (e a0 a : ONote) [NF e] [NF a0] [NF a] : ∀ k m, repr (opowAux e a0 a k m) = ω ^ repr e repr (opowAux 0 a0 a k m) \| 0, m => by cases m <;> simp [opowAux] \| k + 1, m => by by_cases h : m = 0 · simp [h, opowAux, mul_add, opow_add, mul_assoc, scale_opowAux _ _ _ k] · -- Porting note: rewrote proof rw [opowAux]; swap · assumption rw [opowAux]; swap · assumption rw [repr_add, repr_scale, scale_opowAux _ _ _ k] simp only [repr_add, repr_scale, opow_add, mul_assoc, zero_add, mul_add] theorem repr_opow_aux₁ {e a} [Ne : NF e] [Na : NF a] {a' : Ordinal} (e0 : repr e ≠ 0) (h : a' < (ω : Ordinal.{0}) ^ repr e) (aa : repr a = a') (n : ℕ+) : ((ω : Ordinal.{0}) ^ repr e * (n : ℕ) + a') ^ (ω : Ordinal.{0}) = (ω ^ repr e) ^ (ω : Ordinal.{0}) := by subst aa have No := Ne.oadd n (Na.below_of_lt' h) have := omega0_le_oadd e n a rw [repr] at this refine le_antisymm ?_ (opow_le_opow_left _ this) apply (opow_le_of_limit ((opow_pos _ omega0_pos).trans_le this).ne' isLimit_omega0).2 intro b l have := (No.below_of_lt (lt_succ _)).repr_lt rw [repr] at this apply (opow_le_opow_left b <\| this.le).trans rw [← opow_mul, ← opow_mul] apply opow_le_opow_right omega0_pos rcases le_or_lt ω (repr e) with h \| h · apply (mul_le_mul_left' (le_succ b) _).trans rw [← add_one_eq_succ, add_mul_succ _ (one_add_of_omega0_le h), add_one_eq_succ, succ_le_iff, Ordinal.mul_lt_mul_iff_left (Ordinal.pos_iff_ne_zero.2 e0)] exact isLimit_omega0.succ_lt l · apply (principal_mul_omega0 (isLimit_omega0.succ_lt h) l).le.trans simpa using mul_le_mul_right' (one_le_iff_ne_zero.2 e0) ω section -- Porting note: `R'` is used in the proof but marked as an unused variable. set_option linter.unusedVariables false in theorem repr_opow_aux₂ {a0 a'} [N0 : NF a0] [Na' : NF a'] (m : ℕ) (d : ω ∣ repr a') (e0 : repr a0 ≠ 0) (h : repr a' + m < (ω ^ repr a0)) (n : ℕ+) (k : ℕ) : let R := repr (opowAux 0 a0 (oadd a0 n a' * ofNat m) k m) (k ≠ 0 → R < ((ω ^ repr a0) ^ succ (k : Ordinal))) ∧ ((ω ^ repr a0) ^ (k : Ordinal)) * ((ω ^ repr a0) * (n : ℕ) + repr a') + R = ((ω ^ repr a0) * (n : ℕ) + repr a' + m) ^ succ (k : Ordinal) := by intro R' haveI No : NF (oadd a0 n a') := N0.oadd n (Na'.below_of_lt' <\| lt_of_le_of_lt (le_add_right _ _) h) induction' k with k IH · cases m <;> simp [R', opowAux] -- rename R => R' let R := repr (opowAux 0 a0 (oadd a0 n a' * ofNat m) k m) let ω0 := ω ^ repr a0 let α' := ω0 * n + repr a' change (k ≠ 0 → R < (ω0 ^ succ (k : Ordinal))) ∧ (ω0 ^ (k : Ordinal)) * α' + R = (α' + m) ^ (succ ↑k : Ordinal) at IH have RR : R' = ω0 ^ (k : Ordinal) * (α' * m) + R := by by_cases h : m = 0 · simp only [R, R', h, ONote.ofNat, Nat.cast_zero, zero_add, ONote.repr, mul_zero, ONote.opowAux, add_zero] · simp only [α', ω0, R, R', ONote.repr_scale, ONote.repr, ONote.mulNat_eq_mul, ONote.opowAux, ONote.repr_ofNat, ONote.repr_mul, ONote.repr_add, Ordinal.opow_mul, ONote.zero_add] have α0 : 0 < α' := by simpa [lt_def, repr] using oadd_pos a0 n a' have ω00 : 0 < ω0 ^ (k : Ordinal) := opow_pos _ (opow_pos _ omega0_pos) have Rl : R < ω ^ (repr a0 * succ ↑k) := by by_cases k0 : k = 0 · simp only [k0, Nat.cast_zero, succ_zero, mul_one, R] refine lt_of_lt_of_le ?_ (opow_le_opow_right omega0_pos (one_le_iff_ne_zero.2 e0)) rcases m with - \| m <;> simp [opowAux, omega0_pos] rw [← add_one_eq_succ, ← Nat.cast_succ] apply nat_lt_omega0 · rw [opow_mul] exact IH.1 k0 refine ⟨fun _ => ?_, ?_⟩ · rw [RR, ← opow_mul _ _ (succ k.succ)] have e0 := Ordinal.pos_iff_ne_zero.2 e0 have rr0 : 0 < repr a0 + repr a0 := lt_of_lt_of_le e0 (le_add_left _ _) apply principal_add_omega0_opow · simp only [Nat.succ_eq_add_one, Nat.cast_add, Nat.cast_one, add_one_eq_succ, opow_mul, opow_succ, mul_assoc] rw [Ordinal.mul_lt_mul_iff_left ω00, ← Ordinal.opow_add] have : _ < ω ^ (repr a0 + repr a0) := (No.below_of_lt ?_).repr_lt · exact mul_lt_omega0_opow rr0 this (nat_lt_omega0 _) · simpa using (add_lt_add_iff_left (repr a0)).2 e0 · exact lt_of_lt_of_le Rl (opow_le_opow_right omega0_pos <\| mul_le_mul_left' (succ_le_succ_iff.2 (Nat.cast_le.2 (le_of_lt k.lt_succ_self))) _) calc (ω0 ^ (k.succ : Ordinal)) * α' + R' _ = (ω0 ^ succ (k : Ordinal)) * α' + ((ω0 ^ (k : Ordinal)) * α' * m + R) := by rw [natCast_succ, RR, ← mul_assoc] _ = ((ω0 ^ (k : Ordinal)) * α' + R) * α' + ((ω0 ^ (k : Ordinal)) * α' + R) * m := ?_ _ = (α' + m) ^ succ (k.succ : Ordinal) := by rw [← mul_add, natCast_succ, opow_succ, IH.2] congr 1 · have αd : ω ∣ α' := dvd_add (dvd_mul_of_dvd_left (by simpa using opow_dvd_opow ω (one_le_iff_ne_zero.2 e0)) _) d rw [mul_add (ω0 ^ (k : Ordinal)), add_assoc, ← mul_assoc, ← opow_succ, add_mul_limit _ (isLimit_iff_omega0_dvd.2 ⟨ne_of_gt α0, αd⟩), mul_assoc, @mul_omega0_dvd n (Nat.cast_pos'.2 n.pos) (nat_lt_omega0 _) _ αd] apply @add_absorp _ (repr a0 * succ ↑k) · refine principal_add_omega0_opow _ ?_ Rl rw [opow_mul, opow_succ, Ordinal.mul_lt_mul_iff_left ω00] exact No.snd'.repr_lt · have := mul_le_mul_left' (one_le_iff_pos.2 <\| Nat.cast_pos'.2 n.pos) (ω0 ^ succ (k : Ordinal)) rw [opow_mul] simpa [-opow_succ] · cases m · have : R = 0 := by cases k <;> simp [R, opowAux] simp [this] · rw [natCast_succ, add_mul_succ] apply add_absorp Rl rw [opow_mul, opow_succ] apply mul_le_mul_left' simpa [repr] using omega0_le_oadd a0 n a' end theorem repr_opow (o₁ o₂) [NF o₁] [NF o₂] : repr (o₁ ^ o₂) = repr o₁ ^ repr o₂ := by rcases e₁ : split o₁ with ⟨a, m⟩ obtain ⟨N₁, r₁⟩ := nf_repr_split e₁ obtain - \| ⟨a0, n, a'⟩ := a · rcases m with - \| m · by_cases h : o₂ = 0 <;> simp [opow_def, opowAux2, opow, e₁, h, r₁] have := mt repr_inj.1 h rw [zero_opow this] · rcases e₂ : split' o₂ with ⟨b', k⟩ obtain ⟨_, r₂⟩ := nf_repr_split' e₂ by_cases h : m = 0 · simp [opowAux2, opow_def, opow, e₁, h, r₁, e₂, r₂] simp only [opow_def, opowAux2, opow, e₁, h, r₁, e₂, r₂, repr, opow_zero, Nat.succPNat_coe, Nat.cast_succ, Nat.cast_zero, _root_.zero_add, mul_one, add_zero, one_opow, npow_eq_pow] rw [opow_add, opow_mul, opow_omega0, add_one_eq_succ] · congr conv_lhs => dsimp [(· ^ ·)] simp [Pow.pow, opow, Ordinal.succ_ne_zero] rw [opow_natCast] · simpa [Nat.one_le_iff_ne_zero] · rw [← Nat.cast_succ, lt_omega0] exact ⟨_, rfl⟩ · haveI := N₁.fst haveI := N₁.snd obtain ⟨a00, ad⟩ := N₁.of_dvd_omega0 (split_dvd e₁) have al := split_add_lt e₁ have aa : repr (a' + ofNat m) = repr a' + m := by simp only [eq_self_iff_true, ONote.repr_ofNat, ONote.repr_add] rcases e₂ : split' o₂ with ⟨b', k⟩ obtain ⟨_, r₂⟩ := nf_repr_split' e₂ simp only [opow_def, opow, e₁, r₁, split_eq_scale_split' e₂, opowAux2, repr] rcases k with - \| k · simp [r₂, opow_mul, repr_opow_aux₁ a00 al aa, add_assoc] · simp [opow, opowAux2, r₂, opow_add, opow_mul, mul_assoc, add_assoc] rw [repr_opow_aux₁ a00 al aa, scale_opowAux] simp only [repr_mul, repr_scale, repr, opow_zero, PNat.val_ofNat, Nat.cast_one, mul_one, add_zero, opow_one, opow_mul] rw [← mul_add, ← add_assoc ((ω : Ordinal.{0}) ^ repr a0 * (n : ℕ))] congr 1 rw [← pow_succ, ← opow_natCast, ← opow_natCast] exact (repr_opow_aux₂ _ ad a00 al _ _).2 /-- Given an ordinal, returns: * `inl none` for `0` * `inl (some a)` for `a + 1` * `inr f` for a limit ordinal `a`, where `f i` is a sequence converging to `a` -/ def fundamentalSequence : ONote → (Option ONote) ⊕ (ℕ → ONote) \| zero => Sum.inl none \| oadd a m b => match fundamentalSequence b with \| Sum.inr f => Sum.inr fun i => oadd a m (f i) \| Sum.inl (some b') => Sum.inl (some (oadd a m b')) \| Sum.inl none => match fundamentalSequence a, m.natPred with \| Sum.inl none, 0 => Sum.inl (some zero) \| Sum.inl none, m + 1 => Sum.inl (some (oadd zero m.succPNat zero)) \| Sum.inl (some a'), 0 => Sum.inr fun i => oadd a' i.succPNat zero \| Sum.inl (some a'), m + 1 => Sum.inr fun i => oadd a m.succPNat (oadd a' i.succPNat zero) \| Sum.inr f, 0 => Sum.inr fun i => oadd (f i) 1 zero \| Sum.inr f, m + 1 => Sum.inr fun i => oadd a m.succPNat (oadd (f i) 1 zero) private theorem exists_lt_add {α} [hα : Nonempty α] {o : Ordinal} {f : α → Ordinal} (H : ∀ ⦃a⦄, a < o → ∃ i, a < f i) {b : Ordinal} ⦃a⦄ (h : a < b + o) : ∃ i, a < b + f i := by rcases lt_or_le a b with h \| h' · obtain ⟨i⟩ := id hα exact ⟨i, h.trans_le (le_add_right _ _)⟩ · rw [← Ordinal.add_sub_cancel_of_le h', add_lt_add_iff_left] at h refine (H h).imp fun i H => ?_ rwa [← Ordinal.add_sub_cancel_of_le h', add_lt_add_iff_left] private theorem exists_lt_mul_omega0' {o : Ordinal} ⦃a⦄ (h : a < o * ω) : ∃ i : ℕ, a < o * ↑i + o := by obtain ⟨i, hi, h'⟩ := (lt_mul_of_limit isLimit_omega0).1 h obtain ⟨i, rfl⟩ := lt_omega0.1 hi exact ⟨i, h'.trans_le (le_add_right _ _)⟩ private theorem exists_lt_omega0_opow' {α} {o b : Ordinal} (hb : 1 < b) (ho : o.IsLimit) {f : α → Ordinal} (H : ∀ ⦃a⦄, a < o → ∃ i, a < f i) ⦃a⦄ (h : a < b ^ o) : ∃ i, a < b ^ f i := by obtain ⟨d, hd, h'⟩ := (lt_opow_of_limit (zero_lt_one.trans hb).ne' ho).1 h exact (H hd).imp fun i hi => h'.trans <\| (opow_lt_opow_iff_right hb).2 hi /-- The property satisfied by `fundamentalSequence o`: * `inl none` means `o = 0` * `inl (some a)` means `o = succ a` * `inr f` means `o` is a limit ordinal and `f` is a strictly increasing sequence which converges to `o` -/ def FundamentalSequenceProp (o : ONote) : (Option ONote) ⊕ (ℕ → ONote) → Prop \| Sum.inl none => o = 0 \| Sum.inl (some a) => o.repr = succ a.repr ∧ (o.NF → a.NF) \| Sum.inr f => o.repr.IsLimit ∧ (∀ i, f i < f (i + 1) ∧ f i < o ∧ (o.NF → (f i).NF)) ∧ ∀ a, a < o.repr → ∃ i, a < (f i).repr theorem fundamentalSequenceProp_inl_none (o) : FundamentalSequenceProp o (Sum.inl none) ↔ o = 0 := Iff.rfl theorem fundamentalSequenceProp_inl_some (o a) : FundamentalSequenceProp o (Sum.inl (some a)) ↔ o.repr = succ a.repr ∧ (o.NF → a.NF) := Iff.rfl theorem fundamentalSequenceProp_inr (o f) : FundamentalSequenceProp o (Sum.inr f) ↔ o.repr.IsLimit ∧ (∀ i, f i < f (i + 1) ∧ f i < o ∧ (o.NF → (f i).NF)) ∧ ∀ a, a < o.repr → ∃ i, a < (f i).repr := Iff.rfl theorem fundamentalSequence_has_prop (o) : FundamentalSequenceProp o (fundamentalSequence o) := by induction' o with a m b iha ihb; · exact rfl rw [fundamentalSequence] rcases e : b.fundamentalSequence with (⟨_ \| b'⟩ \| f) <;> simp only [FundamentalSequenceProp] <;> rw [e, FundamentalSequenceProp] at ihb · rcases e : a.fundamentalSequence with (⟨_ \| a'⟩ \| f) <;> rcases e' : m.natPred with - \| m' <;> simp only [FundamentalSequenceProp] <;> rw [e, FundamentalSequenceProp] at iha <;> (try rw [show m = 1 by have := PNat.natPred_add_one m; rw [e'] at this; exact PNat.coe_inj.1 this.symm]) <;> (try rw [show m = (m' + 1).succPNat by rw [← e', ← PNat.coe_inj, Nat.succPNat_coe, ← Nat.add_one, PNat.natPred_add_one]]) <;> simp only [repr, iha, ihb, opow_lt_opow_iff_right one_lt_omega0, add_lt_add_iff_left, add_zero, eq_self_iff_true, lt_add_iff_pos_right, lt_def, mul_one, Nat.cast_zero, Nat.cast_succ, Nat.succPNat_coe, opow_succ, opow_zero, mul_add_one, PNat.one_coe, succ_zero, _root_.zero_add, zero_def] · decide · exact ⟨rfl, inferInstance⟩ · have := opow_pos (repr a') omega0_pos refine ⟨isLimit_mul this isLimit_omega0, fun i => ⟨this, ?_, fun H => @NF.oadd_zero _ _ (iha.2 H.fst)⟩, exists_lt_mul_omega0'⟩ rw [← mul_succ, ← natCast_succ, Ordinal.mul_lt_mul_iff_left this] apply nat_lt_omega0 · have := opow_pos (repr a') omega0_pos refine ⟨isLimit_add _ (isLimit_mul this isLimit_omega0), fun i => ⟨this, ?_, ?_⟩, exists_lt_add exists_lt_mul_omega0'⟩ · rw [← mul_succ, ← natCast_succ, Ordinal.mul_lt_mul_iff_left this] apply nat_lt_omega0 · refine fun H => H.fst.oadd _ (NF.below_of_lt' ?_ (@NF.oadd_zero _ _ (iha.2 H.fst))) rw [repr, ← zero_def, repr, add_zero, iha.1, opow_succ, Ordinal.mul_lt_mul_iff_left this] apply nat_lt_omega0 · rcases iha with ⟨h1, h2, h3⟩ refine ⟨isLimit_opow one_lt_omega0 h1, fun i => ?_, exists_lt_omega0_opow' one_lt_omega0 h1 h3⟩ obtain ⟨h4, h5, h6⟩ := h2 i exact ⟨h4, h5, fun H => @NF.oadd_zero _ _ (h6 H.fst)⟩ · rcases iha with ⟨h1, h2, h3⟩ refine ⟨isLimit_add _ (isLimit_opow one_lt_omega0 h1), fun i => ?_, exists_lt_add (exists_lt_omega0_opow' one_lt_omega0 h1 h3)⟩ obtain ⟨h4, h5, h6⟩ := h2 i refine ⟨h4, h5, fun H => H.fst.oadd _ (NF.below_of_lt' ?_ (@NF.oadd_zero _ _ (h6 H.fst)))⟩	rwa [repr, ← zero_def, repr, add_zero, PNat.one_coe, Nat.cast_one, mul_one, opow_lt_opow_iff_right one_lt_omega0] · refine ⟨by rw [repr, ihb.1, add_succ, repr], fun H => H.fst.oadd _ (NF.below_of_lt' ?_ (ihb.2 H.snd))⟩ have := H.snd'.repr_lt rw [ihb.1] at this exact (lt_succ _).trans this · rcases ihb with ⟨h1, h2, h3⟩	Mathlib/SetTheory/Ordinal/Notation.lean	1,036	1,043
/- 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.Angle import Mathlib.Analysis.SpecialFunctions.Trigonometric.Inverse /-! # The argument of a complex number. We define `arg : ℂ → ℝ`, returning a real number in the range (-π, π], such that for `x ≠ 0`, `sin (arg x) = x.im / x.abs` and `cos (arg x) = x.re / x.abs`, while `arg 0` defaults to `0` -/ open Filter Metric Set open scoped ComplexConjugate Real Topology namespace Complex variable {a x z : ℂ} /-- `arg` returns values in the range (-π, π], such that for `x ≠ 0`, `sin (arg x) = x.im / x.abs` and `cos (arg x) = x.re / x.abs`, `arg 0` defaults to `0` -/ noncomputable def arg (x : ℂ) : ℝ := if 0 ≤ x.re then Real.arcsin (x.im / ‖x‖) else if 0 ≤ x.im then Real.arcsin ((-x).im / ‖x‖) + π else Real.arcsin ((-x).im / ‖x‖) - π theorem sin_arg (x : ℂ) : Real.sin (arg x) = x.im / ‖x‖ := by unfold arg; split_ifs <;> simp [sub_eq_add_neg, arg, Real.sin_arcsin (abs_le.1 (abs_im_div_norm_le_one x)).1 (abs_le.1 (abs_im_div_norm_le_one x)).2, Real.sin_add, neg_div, Real.arcsin_neg, Real.sin_neg] theorem cos_arg {x : ℂ} (hx : x ≠ 0) : Real.cos (arg x) = x.re / ‖x‖ := by rw [arg] split_ifs with h₁ h₂ · rw [Real.cos_arcsin] field_simp [Real.sqrt_sq, (norm_pos_iff.mpr hx).le, ] · rw [Real.cos_add_pi, Real.cos_arcsin] field_simp [Real.sqrt_div (sq_nonneg _), Real.sqrt_sq_eq_abs, _root_.abs_of_neg (not_le.1 h₁), ] · rw [Real.cos_sub_pi, Real.cos_arcsin] field_simp [Real.sqrt_div (sq_nonneg _), Real.sqrt_sq_eq_abs, _root_.abs_of_neg (not_le.1 h₁), ] @[simp] theorem norm_mul_exp_arg_mul_I (x : ℂ) : ‖x‖ exp (arg x * I) = x := by rcases eq_or_ne x 0 with (rfl \| hx) · simp · have : ‖x‖ ≠ 0 := norm_ne_zero_iff.mpr hx apply Complex.ext <;> field_simp [sin_arg, cos_arg hx, this, mul_comm ‖x‖] @[simp] theorem norm_mul_cos_add_sin_mul_I (x : ℂ) : (‖x‖ * (cos (arg x) + sin (arg x) * I) : ℂ) = x := by rw [← exp_mul_I, norm_mul_exp_arg_mul_I] @[simp] lemma norm_mul_cos_arg (x : ℂ) : ‖x‖ * Real.cos (arg x) = x.re := by simpa [-norm_mul_cos_add_sin_mul_I] using congr_arg re (norm_mul_cos_add_sin_mul_I x) @[simp] lemma norm_mul_sin_arg (x : ℂ) : ‖x‖ * Real.sin (arg x) = x.im := by simpa [-norm_mul_cos_add_sin_mul_I] using congr_arg im (norm_mul_cos_add_sin_mul_I x) theorem norm_eq_one_iff (z : ℂ) : ‖z‖ = 1 ↔ ∃ θ : ℝ, exp (θ * I) = z := by refine ⟨fun hz => ⟨arg z, ?_⟩, ?_⟩ · calc exp (arg z * I) = ‖z‖ * exp (arg z * I) := by rw [hz, ofReal_one, one_mul] _ = z :=norm_mul_exp_arg_mul_I z · rintro ⟨θ, rfl⟩ exact Complex.norm_exp_ofReal_mul_I θ @[deprecated (since := "2025-02-16")] alias abs_mul_exp_arg_mul_I := norm_mul_exp_arg_mul_I @[deprecated (since := "2025-02-16")] alias abs_mul_cos_add_sin_mul_I := norm_mul_cos_add_sin_mul_I @[deprecated (since := "2025-02-16")] alias abs_mul_cos_arg := norm_mul_cos_arg @[deprecated (since := "2025-02-16")] alias abs_mul_sin_arg := norm_mul_sin_arg @[deprecated (since := "2025-02-16")] alias abs_eq_one_iff := norm_eq_one_iff @[simp] theorem range_exp_mul_I : (Set.range fun x : ℝ => exp (x * I)) = Metric.sphere 0 1 := by ext x simp only [mem_sphere_zero_iff_norm, norm_eq_one_iff, Set.mem_range] theorem arg_mul_cos_add_sin_mul_I {r : ℝ} (hr : 0 < r) {θ : ℝ} (hθ : θ ∈ Set.Ioc (-π) π) : arg (r * (cos θ + sin θ * I)) = θ := by simp only [arg, norm_mul, norm_cos_add_sin_mul_I, Complex.norm_of_nonneg hr.le, mul_one] simp only [re_ofReal_mul, im_ofReal_mul, neg_im, ← ofReal_cos, ← ofReal_sin, ← mk_eq_add_mul_I, neg_div, mul_div_cancel_left₀ _ hr.ne', mul_nonneg_iff_right_nonneg_of_pos hr] by_cases h₁ : θ ∈ Set.Icc (-(π / 2)) (π / 2) · rw [if_pos] exacts [Real.arcsin_sin' h₁, Real.cos_nonneg_of_mem_Icc h₁] · rw [Set.mem_Icc, not_and_or, not_le, not_le] at h₁ rcases h₁ with h₁ \| h₁ · replace hθ := hθ.1 have hcos : Real.cos θ < 0 := by rw [← neg_pos, ← Real.cos_add_pi] refine Real.cos_pos_of_mem_Ioo ⟨?_, ?_⟩ <;> linarith have hsin : Real.sin θ < 0 := Real.sin_neg_of_neg_of_neg_pi_lt (by linarith) hθ rw [if_neg, if_neg, ← Real.sin_add_pi, Real.arcsin_sin, add_sub_cancel_right] <;> [linarith; linarith; exact hsin.not_le; exact hcos.not_le] · replace hθ := hθ.2 have hcos : Real.cos θ < 0 := Real.cos_neg_of_pi_div_two_lt_of_lt h₁ (by linarith) have hsin : 0 ≤ Real.sin θ := Real.sin_nonneg_of_mem_Icc ⟨by linarith, hθ⟩ rw [if_neg, if_pos, ← Real.sin_sub_pi, Real.arcsin_sin, sub_add_cancel] <;> [linarith; linarith; exact hsin; exact hcos.not_le] theorem arg_cos_add_sin_mul_I {θ : ℝ} (hθ : θ ∈ Set.Ioc (-π) π) : arg (cos θ + sin θ * I) = θ := by rw [← one_mul (_ + _), ← ofReal_one, arg_mul_cos_add_sin_mul_I zero_lt_one hθ] lemma arg_exp_mul_I (θ : ℝ) : arg (exp (θ * I)) = toIocMod (mul_pos two_pos Real.pi_pos) (-π) θ := by convert arg_cos_add_sin_mul_I (θ := toIocMod (mul_pos two_pos Real.pi_pos) (-π) θ) _ using 2 · rw [← exp_mul_I, eq_sub_of_add_eq <\| toIocMod_add_toIocDiv_zsmul _ _ θ, ofReal_sub, ofReal_zsmul, ofReal_mul, ofReal_ofNat, exp_mul_I_periodic.sub_zsmul_eq] · convert toIocMod_mem_Ioc _ _ _ ring @[simp] theorem arg_zero : arg 0 = 0 := by simp [arg, le_refl] theorem ext_norm_arg {x y : ℂ} (h₁ : ‖x‖ = ‖y‖) (h₂ : x.arg = y.arg) : x = y := by rw [← norm_mul_exp_arg_mul_I x, ← norm_mul_exp_arg_mul_I y, h₁, h₂] theorem ext_norm_arg_iff {x y : ℂ} : x = y ↔ ‖x‖ = ‖y‖ ∧ arg x = arg y := ⟨fun h => h ▸ ⟨rfl, rfl⟩, and_imp.2 ext_norm_arg⟩ @[deprecated (since := "2025-02-16")] alias ext_abs_arg := ext_norm_arg @[deprecated (since := "2025-02-16")] alias ext_abs_arg_iff := ext_norm_arg_iff theorem arg_mem_Ioc (z : ℂ) : arg z ∈ Set.Ioc (-π) π := by have hπ : 0 < π := Real.pi_pos rcases eq_or_ne z 0 with (rfl \| hz) · simp [hπ, hπ.le] rcases existsUnique_add_zsmul_mem_Ioc Real.two_pi_pos (arg z) (-π) with ⟨N, hN, -⟩ rw [two_mul, neg_add_cancel_left, ← two_mul, zsmul_eq_mul] at hN rw [← norm_mul_cos_add_sin_mul_I z, ← cos_add_int_mul_two_pi _ N, ← sin_add_int_mul_two_pi _ N] have := arg_mul_cos_add_sin_mul_I (norm_pos_iff.mpr hz) hN push_cast at this rwa [this] @[simp]	theorem range_arg : Set.range arg = Set.Ioc (-π) π := (Set.range_subset_iff.2 arg_mem_Ioc).antisymm fun _ hx => ⟨_, arg_cos_add_sin_mul_I hx⟩ theorem arg_le_pi (x : ℂ) : arg x ≤ π := (arg_mem_Ioc x).2 theorem neg_pi_lt_arg (x : ℂ) : -π < arg x := (arg_mem_Ioc x).1 theorem abs_arg_le_pi (z : ℂ) : \|arg z\| ≤ π :=	Mathlib/Analysis/SpecialFunctions/Complex/Arg.lean	143	152
/- Copyright (c) 2023 Jeremy Tan. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Tan -/ import Mathlib.Combinatorics.SimpleGraph.Finite import Mathlib.Combinatorics.SimpleGraph.Maps import Mathlib.Combinatorics.SimpleGraph.Subgraph /-! # Local graph operations This file defines some single-graph operations that modify a finite number of vertices and proves basic theorems about them. When the graph itself has a finite number of vertices we also prove theorems about the number of edges in the modified graphs. ## Main definitions * `G.replaceVertex s t` is `G` with `t` replaced by a copy of `s`, removing the `s-t` edge if present. * `edge s t` is the graph with a single `s-t` edge. Adding this edge to a graph `G` is then `G ⊔ edge s t`. -/ open Finset namespace SimpleGraph variable {V : Type} (G : SimpleGraph V) (s t : V) namespace Iso variable {G} {W : Type} {G' : SimpleGraph W} (f : G ≃g G') include f in theorem card_edgeFinset_eq [Fintype G.edgeSet] [Fintype G'.edgeSet] : #G.edgeFinset = #G'.edgeFinset := by apply Finset.card_eq_of_equiv simp only [Set.mem_toFinset] exact f.mapEdgeSet end Iso section ReplaceVertex variable [DecidableEq V] /-- The graph formed by forgetting `t`'s neighbours and instead giving it those of `s`. The `s-t` edge is removed if present. -/ def replaceVertex : SimpleGraph V where Adj v w := if v = t then if w = t then False else G.Adj s w else if w = t then G.Adj v s else G.Adj v w symm v w := by dsimp only; split_ifs <;> simp [adj_comm] /-- There is never an `s-t` edge in `G.replaceVertex s t`. -/ lemma not_adj_replaceVertex_same : ¬(G.replaceVertex s t).Adj s t := by simp [replaceVertex] @[simp] lemma replaceVertex_self : G.replaceVertex s s = G := by ext; unfold replaceVertex; aesop (add simp or_iff_not_imp_left) variable {t} /-- Except possibly for `t`, the neighbours of `s` in `G.replaceVertex s t` are its neighbours in `G`. -/ lemma adj_replaceVertex_iff_of_ne_left {w : V} (hw : w ≠ t) : (G.replaceVertex s t).Adj s w ↔ G.Adj s w := by simp [replaceVertex, hw] /-- Except possibly for itself, the neighbours of `t` in `G.replaceVertex s t` are the neighbours of `s` in `G`. -/ lemma adj_replaceVertex_iff_of_ne_right {w : V} (hw : w ≠ t) : (G.replaceVertex s t).Adj t w ↔ G.Adj s w := by simp [replaceVertex, hw] /-- Adjacency in `G.replaceVertex s t` which does not involve `t` is the same as that of `G`. -/ lemma adj_replaceVertex_iff_of_ne {v w : V} (hv : v ≠ t) (hw : w ≠ t) : (G.replaceVertex s t).Adj v w ↔ G.Adj v w := by simp [replaceVertex, hv, hw] variable {s} theorem edgeSet_replaceVertex_of_not_adj (hn : ¬G.Adj s t) : (G.replaceVertex s t).edgeSet = G.edgeSet \ G.incidenceSet t ∪ (s(·, t)) '' (G.neighborSet s) := by ext e; refine e.inductionOn ?_ simp only [replaceVertex, mem_edgeSet, Set.mem_union, Set.mem_diff, mk'_mem_incidenceSet_iff] intros; split_ifs; exacts [by simp_all, by aesop, by rw [adj_comm]; aesop, by aesop] theorem edgeSet_replaceVertex_of_adj (ha : G.Adj s t) : (G.replaceVertex s t).edgeSet = (G.edgeSet \ G.incidenceSet t ∪ (s(·, t)) '' (G.neighborSet s)) \ {s(t, t)} := by ext e; refine e.inductionOn ?_ simp only [replaceVertex, mem_edgeSet, Set.mem_union, Set.mem_diff, mk'_mem_incidenceSet_iff] intros; split_ifs; exacts [by simp_all, by aesop, by rw [adj_comm]; aesop, by aesop] variable [Fintype V] [DecidableRel G.Adj] instance : DecidableRel (G.replaceVertex s t).Adj := by unfold replaceVertex; infer_instance theorem edgeFinset_replaceVertex_of_not_adj (hn : ¬G.Adj s t) : (G.replaceVertex s t).edgeFinset = G.edgeFinset \ G.incidenceFinset t ∪ (G.neighborFinset s).image (s(·, t)) := by simp only [incidenceFinset, neighborFinset, ← Set.toFinset_diff, ← Set.toFinset_image, ← Set.toFinset_union] exact Set.toFinset_congr (G.edgeSet_replaceVertex_of_not_adj hn) theorem edgeFinset_replaceVertex_of_adj (ha : G.Adj s t) : (G.replaceVertex s t).edgeFinset = (G.edgeFinset \ G.incidenceFinset t ∪ (G.neighborFinset s).image (s(·, t))) \ {s(t, t)} := by simp only [incidenceFinset, neighborFinset, ← Set.toFinset_diff, ← Set.toFinset_image, ← Set.toFinset_union, ← Set.toFinset_singleton] exact Set.toFinset_congr (G.edgeSet_replaceVertex_of_adj ha) lemma disjoint_sdiff_neighborFinset_image : Disjoint (G.edgeFinset \ G.incidenceFinset t) ((G.neighborFinset s).image (s(·, t))) := by rw [disjoint_iff_ne] intro e he have : t ∉ e := by rw [mem_sdiff, mem_incidenceFinset] at he obtain ⟨_, h⟩ := he contrapose! h simp_all [incidenceSet] aesop theorem card_edgeFinset_replaceVertex_of_not_adj (hn : ¬G.Adj s t) : #(G.replaceVertex s t).edgeFinset = #G.edgeFinset + G.degree s - G.degree t := by have inc : G.incidenceFinset t ⊆ G.edgeFinset := by simp [incidenceFinset, incidenceSet_subset] rw [G.edgeFinset_replaceVertex_of_not_adj hn, card_union_of_disjoint G.disjoint_sdiff_neighborFinset_image, card_sdiff inc, ← Nat.sub_add_comm <\| card_le_card inc, card_incidenceFinset_eq_degree] congr 2	rw [card_image_of_injective, card_neighborFinset_eq_degree] unfold Function.Injective aesop theorem card_edgeFinset_replaceVertex_of_adj (ha : G.Adj s t) : #(G.replaceVertex s t).edgeFinset = #G.edgeFinset + G.degree s - G.degree t - 1 := by have inc : G.incidenceFinset t ⊆ G.edgeFinset := by simp [incidenceFinset, incidenceSet_subset] rw [G.edgeFinset_replaceVertex_of_adj ha, card_sdiff (by simp [ha]), card_union_of_disjoint G.disjoint_sdiff_neighborFinset_image, card_sdiff inc, ← Nat.sub_add_comm <\| card_le_card inc, card_incidenceFinset_eq_degree]	Mathlib/Combinatorics/SimpleGraph/Operations.lean	126	135
/- 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.SetTheory.Ordinal.Exponential import Mathlib.SetTheory.Ordinal.Family /-! # Cantor Normal Form The Cantor normal form of an ordinal is generally defined as its base `ω` expansion, with its non-zero exponents in decreasing order. Here, we more generally define a base `b` expansion `Ordinal.CNF` in this manner, which is well-behaved for any `b ≥ 2`. # Implementation notes We implement `Ordinal.CNF` as an association list, where keys are exponents and values are coefficients. This is because this structure intrinsically reflects two key properties of the Cantor normal form: - It is ordered. - It has finitely many entries. # Todo - Add API for the coefficients of the Cantor normal form. - Prove the basic results relating the CNF to the arithmetic operations on ordinals. -/ noncomputable section universe u open List namespace Ordinal /-- Inducts on the base `b` expansion of an ordinal. -/ @[elab_as_elim] noncomputable def CNFRec (b : Ordinal) {C : Ordinal → Sort} (H0 : C 0) (H : ∀ o, o ≠ 0 → C (o % b ^ log b o) → C o) (o : Ordinal) : C o := if h : o = 0 then h ▸ H0 else H o h (CNFRec b H0 H (o % b ^ log b o)) termination_by o decreasing_by exact mod_opow_log_lt_self b h @[simp] theorem CNFRec_zero {C : Ordinal → Sort} (b : Ordinal) (H0 : C 0) (H : ∀ o, o ≠ 0 → C (o % b ^ log b o) → C o) : CNFRec b H0 H 0 = H0 := by rw [CNFRec, dif_pos rfl] theorem CNFRec_pos (b : Ordinal) {o : Ordinal} {C : Ordinal → Sort} (ho : o ≠ 0) (H0 : C 0) (H : ∀ o, o ≠ 0 → C (o % b ^ log b o) → C o) : CNFRec b H0 H o = H o ho (@CNFRec b C H0 H _) := by rw [CNFRec, dif_neg] /-- The Cantor normal form of an ordinal `o` is the list of coefficients and exponents in the base-`b` expansion of `o`. We special-case `CNF 0 o = CNF 1 o = [(0, o)]` for `o ≠ 0`. `CNF b (b ^ u₁ v₁ + b ^ u₂ * v₂) = [(u₁, v₁), (u₂, v₂)]` -/ @[pp_nodot] def CNF (b o : Ordinal) : List (Ordinal × Ordinal) := CNFRec b [] (fun o _ IH ↦ (log b o, o / b ^ log b o)::IH) o @[simp] theorem CNF_zero (b : Ordinal) : CNF b 0 = [] := CNFRec_zero b _ _ /-- Recursive definition for the Cantor normal form. -/ theorem CNF_ne_zero {b o : Ordinal} (ho : o ≠ 0) : CNF b o = (log b o, o / b ^ log b o)::CNF b (o % b ^ log b o) := CNFRec_pos b ho _ _ theorem zero_CNF {o : Ordinal} (ho : o ≠ 0) : CNF 0 o = [(0, o)] := by simp [CNF_ne_zero ho] theorem one_CNF {o : Ordinal} (ho : o ≠ 0) : CNF 1 o = [(0, o)] := by simp [CNF_ne_zero ho] theorem CNF_of_le_one {b o : Ordinal} (hb : b ≤ 1) (ho : o ≠ 0) : CNF b o = [(0, o)] := by rcases le_one_iff.1 hb with (rfl \| rfl) exacts [zero_CNF ho, one_CNF ho] theorem CNF_of_lt {b o : Ordinal} (ho : o ≠ 0) (hb : o < b) : CNF b o = [(0, o)] := by rw [CNF_ne_zero ho, log_eq_zero hb, opow_zero, div_one, mod_one, CNF_zero] /-- Evaluating the Cantor normal form of an ordinal returns the ordinal. -/ theorem CNF_foldr (b o : Ordinal) : (CNF b o).foldr (fun p r ↦ b ^ p.1 * p.2 + r) 0 = o := by refine CNFRec b ?_ ?_ o · rw [CNF_zero, foldr_nil] · intro o ho IH rw [CNF_ne_zero ho, foldr_cons, IH, div_add_mod] /-- Every exponent in the Cantor normal form `CNF b o` is less or equal to `log b o`. -/ theorem CNF_fst_le_log {b o : Ordinal.{u}} {x : Ordinal × Ordinal} :	x ∈ CNF b o → x.1 ≤ log b o := by	Mathlib/SetTheory/Ordinal/CantorNormalForm.lean	97	97
/- 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))) = single (g • partialProd f) (a * b) rw [finsuppTensorFinsupp_single, lcongr_single, mapDomain_single, Equiv.refl_apply, actionDiagonalSucc_inv_apply] rfl theorem diagonalSucc_inv_single_left (g : G) (f : Gⁿ →₀ k) (r : k) : (diagonalSucc k G n).inv.hom (Finsupp.single g r ⊗ₜ f) = Finsupp.lift (Gⁿ⁺¹ →₀ k) k Gⁿ (fun f => single (g • partialProd f) r) f := by refine f.induction ?_ ?_ · simp only [TensorProduct.tmul_zero, map_zero] · intro a b x _ _ hx -- `simp` doesn't pick up on `diagonalSucc_inv_single_single` unless it has parentheses. simp only [lift_apply, smul_single', mul_one, TensorProduct.tmul_add, map_add, (diagonalSucc_inv_single_single), hx, Finsupp.sum_single_index, mul_comm b, zero_mul, single_zero] theorem diagonalSucc_inv_single_right (g : G →₀ k) (f : Gⁿ) (r : k) : (diagonalSucc k G n).inv.hom (g ⊗ₜ Finsupp.single f r) = Finsupp.lift _ k G (fun a => single (a • partialProd f) r) g := by refine g.induction ?_ ?_ · simp only [TensorProduct.zero_tmul, map_zero] · intro a b x _ _ hx -- `simp` doesn't pick up on `diagonalSucc_inv_single_single` unless it has parentheses.	simp only [lift_apply, smul_single', map_add, hx, (diagonalSucc_inv_single_single), TensorProduct.add_tmul, Finsupp.sum_single_index, zero_mul, single_zero] end Rep open scoped TensorProduct open Representation /-- The `k[G]`-linear isomorphism `k[G] ⊗ₖ k[Gⁿ] ≃ k[Gⁿ⁺¹]`, where the `k[G]`-module structure on the lefthand side is `TensorProduct.leftModule`, whilst that of the righthand side comes from `Representation.asModule`. Allows us to use `Algebra.TensorProduct.basis` to get a `k[G]`-basis of the righthand side. -/ def ofMulActionBasisAux : MonoidAlgebra k G ⊗[k] ((Fin n → G) →₀ k) ≃ₗ[MonoidAlgebra k G] (ofMulAction k G (Fin (n + 1) → G)).asModule := haveI e := (Rep.equivalenceModuleMonoidAlgebra.1.mapIso (diagonalSucc k G n).symm).toLinearEquiv { e with map_smul' := fun r x => by rw [RingHom.id_apply, LinearEquiv.toFun_eq_coe, ← LinearEquiv.map_smul e]	Mathlib/RepresentationTheory/GroupCohomology/Resolution.lean	224	243
/- 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.Analysis.SpecialFunctions.ImproperIntegrals import Mathlib.Analysis.Calculus.ParametricIntegral import Mathlib.MeasureTheory.Measure.Haar.NormedSpace /-! # The Mellin transform We define the Mellin transform of a locally integrable function on `Ioi 0`, and show it is differentiable in a suitable vertical strip. ## Main statements - `mellin` : the Mellin transform `∫ (t : ℝ) in Ioi 0, t ^ (s - 1) • f t`, where `s` is a complex number. - `HasMellin`: shorthand asserting that the Mellin transform exists and has a given value (analogous to `HasSum`). - `mellin_differentiableAt_of_isBigO_rpow` : if `f` is `O(x ^ (-a))` at infinity, and `O(x ^ (-b))` at 0, then `mellin f` is holomorphic on the domain `b < re s < a`. -/ open MeasureTheory Set Filter Asymptotics TopologicalSpace open Real open Complex hiding exp log abs_of_nonneg open scoped Topology noncomputable section section Defs variable {E : Type} [NormedAddCommGroup E] [NormedSpace ℂ E] /-- Predicate on `f` and `s` asserting that the Mellin integral is well-defined. -/ def MellinConvergent (f : ℝ → E) (s : ℂ) : Prop := IntegrableOn (fun t : ℝ => (t : ℂ) ^ (s - 1) • f t) (Ioi 0) theorem MellinConvergent.const_smul {f : ℝ → E} {s : ℂ} (hf : MellinConvergent f s) {𝕜 : Type} [NontriviallyNormedField 𝕜] [NormedSpace 𝕜 E] [SMulCommClass ℂ 𝕜 E] (c : 𝕜) : MellinConvergent (fun t => c • f t) s := by simpa only [MellinConvergent, smul_comm] using hf.smul c theorem MellinConvergent.cpow_smul {f : ℝ → E} {s a : ℂ} : MellinConvergent (fun t => (t : ℂ) ^ a • f t) s ↔ MellinConvergent f (s + a) := by refine integrableOn_congr_fun (fun t ht => ?_) measurableSet_Ioi simp_rw [← sub_add_eq_add_sub, cpow_add _ _ (ofReal_ne_zero.2 <\| ne_of_gt ht), mul_smul] nonrec theorem MellinConvergent.div_const {f : ℝ → ℂ} {s : ℂ} (hf : MellinConvergent f s) (a : ℂ) : MellinConvergent (fun t => f t / a) s := by simpa only [MellinConvergent, smul_eq_mul, ← mul_div_assoc] using hf.div_const a theorem MellinConvergent.comp_mul_left {f : ℝ → E} {s : ℂ} {a : ℝ} (ha : 0 < a) : MellinConvergent (fun t => f (a * t)) s ↔ MellinConvergent f s := by have := integrableOn_Ioi_comp_mul_left_iff (fun t : ℝ => (t : ℂ) ^ (s - 1) • f t) 0 ha rw [mul_zero] at this have h1 : EqOn (fun t : ℝ => (↑(a * t) : ℂ) ^ (s - 1) • f (a * t)) ((a : ℂ) ^ (s - 1) • fun t : ℝ => (t : ℂ) ^ (s - 1) • f (a * t)) (Ioi 0) := fun t ht ↦ by	simp only [ofReal_mul, mul_cpow_ofReal_nonneg ha.le (le_of_lt ht), mul_smul, Pi.smul_apply] have h2 : (a : ℂ) ^ (s - 1) ≠ 0 := by rw [Ne, cpow_eq_zero_iff, not_and_or, ofReal_eq_zero] exact Or.inl ha.ne' rw [MellinConvergent, MellinConvergent, ← this, integrableOn_congr_fun h1 measurableSet_Ioi, IntegrableOn, IntegrableOn, integrable_smul_iff h2] theorem MellinConvergent.comp_rpow {f : ℝ → E} {s : ℂ} {a : ℝ} (ha : a ≠ 0) : MellinConvergent (fun t => f (t ^ a)) s ↔ MellinConvergent f (s / a) := by refine Iff.trans ?_ (integrableOn_Ioi_comp_rpow_iff' _ ha) rw [MellinConvergent] refine integrableOn_congr_fun (fun t ht => ?_) measurableSet_Ioi	Mathlib/Analysis/MellinTransform.lean	64	75
/- 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	1,736	1,737
/- Copyright (c) 2021 Anatole Dedecker. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Anatole Dedecker -/ import Mathlib.Analysis.Asymptotics.AsymptoticEquivalent import Mathlib.Analysis.SpecificLimits.Basic /-! # A collection of specific asymptotic results This file contains specific lemmas about asymptotics which don't have their place in the general theory developed in `Mathlib.Analysis.Asymptotics.Asymptotics`. -/ open Filter Asymptotics open Topology section NormedField /-- If `f : 𝕜 → E` is bounded in a punctured neighborhood of `a`, then `f(x) = o((x - a)⁻¹)` as `x → a`, `x ≠ a`. -/ theorem Filter.IsBoundedUnder.isLittleO_sub_self_inv {𝕜 E : Type} [NormedField 𝕜] [Norm E] {a : 𝕜} {f : 𝕜 → E} (h : IsBoundedUnder (· ≤ ·) (𝓝[≠] a) (norm ∘ f)) : f =o[𝓝[≠] a] fun x => (x - a)⁻¹ := by refine (h.isBigO_const (one_ne_zero' ℝ)).trans_isLittleO (isLittleO_const_left.2 <\| Or.inr ?_) simp only [Function.comp_def, norm_inv] exact (tendsto_norm_sub_self_nhdsNE a).inv_tendsto_nhdsGT_zero end NormedField section LinearOrderedField variable {𝕜 : Type} [Field 𝕜] [LinearOrder 𝕜] [IsStrictOrderedRing 𝕜] theorem pow_div_pow_eventuallyEq_atTop {p q : ℕ} : (fun x : 𝕜 => x ^ p / x ^ q) =ᶠ[atTop] fun x => x ^ ((p : ℤ) - q) := by apply (eventually_gt_atTop (0 : 𝕜)).mono fun x hx => _ intro x hx simp [zpow_sub₀ hx.ne'] theorem pow_div_pow_eventuallyEq_atBot {p q : ℕ} : (fun x : 𝕜 => x ^ p / x ^ q) =ᶠ[atBot] fun x => x ^ ((p : ℤ) - q) := by apply (eventually_lt_atBot (0 : 𝕜)).mono fun x hx => _ intro x hx simp [zpow_sub₀ hx.ne] theorem tendsto_pow_div_pow_atTop_atTop {p q : ℕ} (hpq : q < p) : Tendsto (fun x : 𝕜 => x ^ p / x ^ q) atTop atTop := by rw [tendsto_congr' pow_div_pow_eventuallyEq_atTop] apply tendsto_zpow_atTop_atTop omega	theorem tendsto_pow_div_pow_atTop_zero [TopologicalSpace 𝕜] [OrderTopology 𝕜] {p q : ℕ} (hpq : p < q) : Tendsto (fun x : 𝕜 => x ^ p / x ^ q) atTop (𝓝 0) := by rw [tendsto_congr' pow_div_pow_eventuallyEq_atTop] apply tendsto_zpow_atTop_zero omega	Mathlib/Analysis/Asymptotics/SpecificAsymptotics.lean	56	60
/- Copyright (c) 2021 Yury Kudryashov. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Yury Kudryashov -/ import Mathlib.Analysis.BoxIntegral.Partition.Basic /-! # Split a box along one or more hyperplanes ## Main definitions A hyperplane `{x : ι → ℝ \| x i = a}` splits a rectangular box `I : BoxIntegral.Box ι` into two smaller boxes. If `a ∉ Ioo (I.lower i, I.upper i)`, then one of these boxes is empty, so it is not a box in the sense of `BoxIntegral.Box`. We introduce the following definitions. * `BoxIntegral.Box.splitLower I i a` and `BoxIntegral.Box.splitUpper I i a` are these boxes (as `WithBot (BoxIntegral.Box ι)`); * `BoxIntegral.Prepartition.split I i a` is the partition of `I` made of these two boxes (or of one box `I` if one of these boxes is empty); * `BoxIntegral.Prepartition.splitMany I s`, where `s : Finset (ι × ℝ)` is a finite set of hyperplanes `{x : ι → ℝ \| x i = a}` encoded as pairs `(i, a)`, is the partition of `I` made by cutting it along all the hyperplanes in `s`. ## Main results The main result `BoxIntegral.Prepartition.exists_iUnion_eq_diff` says that any prepartition `π` of `I` admits a prepartition `π'` of `I` that covers exactly `I \ π.iUnion`. One of these prepartitions is available as `BoxIntegral.Prepartition.compl`. ## Tags rectangular box, partition, hyperplane -/ noncomputable section open Function Set Filter namespace BoxIntegral variable {ι M : Type} {n : ℕ} namespace Box variable {I : Box ι} {i : ι} {x : ℝ} {y : ι → ℝ} open scoped Classical in /-- Given a box `I` and `x ∈ (I.lower i, I.upper i)`, the hyperplane `{y : ι → ℝ \| y i = x}` splits `I` into two boxes. `BoxIntegral.Box.splitLower I i x` is the box `I ∩ {y \| y i ≤ x}` (if it is nonempty). As usual, we represent a box that may be empty as `WithBot (BoxIntegral.Box ι)`. -/ def splitLower (I : Box ι) (i : ι) (x : ℝ) : WithBot (Box ι) := mk' I.lower (update I.upper i (min x (I.upper i))) @[simp] theorem coe_splitLower : (splitLower I i x : Set (ι → ℝ)) = ↑I ∩ { y \| y i ≤ x } := by rw [splitLower, coe_mk'] ext y simp only [mem_univ_pi, mem_Ioc, mem_inter_iff, mem_coe, mem_setOf_eq, forall_and, ← Pi.le_def, le_update_iff, le_min_iff, and_assoc, and_forall_ne (p := fun j => y j ≤ upper I j) i, mem_def] rw [and_comm (a := y i ≤ x)] theorem splitLower_le : I.splitLower i x ≤ I := withBotCoe_subset_iff.1 <\| by simp @[simp] theorem splitLower_eq_bot {i x} : I.splitLower i x = ⊥ ↔ x ≤ I.lower i := by classical rw [splitLower, mk'_eq_bot, exists_update_iff I.upper fun j y => y ≤ I.lower j] simp [(I.lower_lt_upper _).not_le] @[simp] theorem splitLower_eq_self : I.splitLower i x = I ↔ I.upper i ≤ x := by simp [splitLower, update_eq_iff] theorem splitLower_def [DecidableEq ι] {i x} (h : x ∈ Ioo (I.lower i) (I.upper i)) (h' : ∀ j, I.lower j < update I.upper i x j := (forall_update_iff I.upper fun j y => I.lower j < y).2 ⟨h.1, fun _ _ => I.lower_lt_upper _⟩) : I.splitLower i x = (⟨I.lower, update I.upper i x, h'⟩ : Box ι) := by simp +unfoldPartialApp only [splitLower, mk'_eq_coe, min_eq_left h.2.le, update, and_self] open scoped Classical in /-- Given a box `I` and `x ∈ (I.lower i, I.upper i)`, the hyperplane `{y : ι → ℝ \| y i = x}` splits `I` into two boxes. `BoxIntegral.Box.splitUpper I i x` is the box `I ∩ {y \| x < y i}` (if it is nonempty). As usual, we represent a box that may be empty as `WithBot (BoxIntegral.Box ι)`. -/ def splitUpper (I : Box ι) (i : ι) (x : ℝ) : WithBot (Box ι) := mk' (update I.lower i (max x (I.lower i))) I.upper @[simp] theorem coe_splitUpper : (splitUpper I i x : Set (ι → ℝ)) = ↑I ∩ { y \| x < y i } := by classical rw [splitUpper, coe_mk'] ext y simp only [mem_univ_pi, mem_Ioc, mem_inter_iff, mem_coe, mem_setOf_eq, forall_and, forall_update_iff I.lower fun j z => z < y j, max_lt_iff, and_assoc (a := x < y i), and_forall_ne (p := fun j => lower I j < y j) i, mem_def] exact and_comm theorem splitUpper_le : I.splitUpper i x ≤ I := withBotCoe_subset_iff.1 <\| by simp @[simp] theorem splitUpper_eq_bot {i x} : I.splitUpper i x = ⊥ ↔ I.upper i ≤ x := by classical rw [splitUpper, mk'_eq_bot, exists_update_iff I.lower fun j y => I.upper j ≤ y] simp [(I.lower_lt_upper _).not_le] @[simp] theorem splitUpper_eq_self : I.splitUpper i x = I ↔ x ≤ I.lower i := by simp [splitUpper, update_eq_iff] theorem splitUpper_def [DecidableEq ι] {i x} (h : x ∈ Ioo (I.lower i) (I.upper i)) (h' : ∀ j, update I.lower i x j < I.upper j := (forall_update_iff I.lower fun j y => y < I.upper j).2 ⟨h.2, fun _ _ => I.lower_lt_upper _⟩) : I.splitUpper i x = (⟨update I.lower i x, I.upper, h'⟩ : Box ι) := by simp +unfoldPartialApp only [splitUpper, mk'_eq_coe, max_eq_left h.1.le, update, and_self] theorem disjoint_splitLower_splitUpper (I : Box ι) (i : ι) (x : ℝ) : Disjoint (I.splitLower i x) (I.splitUpper i x) := by rw [← disjoint_withBotCoe, coe_splitLower, coe_splitUpper] refine (Disjoint.inf_left' _ ?_).inf_right' _ rw [Set.disjoint_left] exact fun y (hle : y i ≤ x) hlt => not_lt_of_le hle hlt theorem splitLower_ne_splitUpper (I : Box ι) (i : ι) (x : ℝ) : I.splitLower i x ≠ I.splitUpper i x := by rcases le_or_lt x (I.lower i) with h \| _ · rw [splitUpper_eq_self.2 h, splitLower_eq_bot.2 h] exact WithBot.bot_ne_coe · refine (disjoint_splitLower_splitUpper I i x).ne ?_ rwa [Ne, splitLower_eq_bot, not_le] end Box namespace Prepartition variable {I J : Box ι} {i : ι} {x : ℝ} open scoped Classical in /-- The partition of `I : Box ι` into the boxes `I ∩ {y \| y ≤ x i}` and `I ∩ {y \| x i < y}`. One of these boxes can be empty, then this partition is just the single-box partition `⊤`. -/ def split (I : Box ι) (i : ι) (x : ℝ) : Prepartition I := ofWithBot {I.splitLower i x, I.splitUpper i x} (by simp only [Finset.mem_insert, Finset.mem_singleton] rintro J (rfl \| rfl) exacts [Box.splitLower_le, Box.splitUpper_le]) (by simp only [Finset.coe_insert, Finset.coe_singleton, true_and, Set.mem_singleton_iff, pairwise_insert_of_symmetric symmetric_disjoint, pairwise_singleton] rintro J rfl - exact I.disjoint_splitLower_splitUpper i x) @[simp] theorem mem_split_iff : J ∈ split I i x ↔ ↑J = I.splitLower i x ∨ ↑J = I.splitUpper i x := by simp [split] theorem mem_split_iff' : J ∈ split I i x ↔ (J : Set (ι → ℝ)) = ↑I ∩ { y \| y i ≤ x } ∨ (J : Set (ι → ℝ)) = ↑I ∩ { y \| x < y i } := by simp [mem_split_iff, ← Box.withBotCoe_inj] @[simp] theorem iUnion_split (I : Box ι) (i : ι) (x : ℝ) : (split I i x).iUnion = I := by simp [split, ← inter_union_distrib_left, ← setOf_or, le_or_lt] theorem isPartitionSplit (I : Box ι) (i : ι) (x : ℝ) : IsPartition (split I i x) := isPartition_iff_iUnion_eq.2 <\| iUnion_split I i x theorem sum_split_boxes {M : Type} [AddCommMonoid M] (I : Box ι) (i : ι) (x : ℝ) (f : Box ι → M) : (∑ J ∈ (split I i x).boxes, f J) = (I.splitLower i x).elim' 0 f + (I.splitUpper i x).elim' 0 f := by classical rw [split, sum_ofWithBot, Finset.sum_pair (I.splitLower_ne_splitUpper i x)] /-- If `x ∉ (I.lower i, I.upper i)`, then the hyperplane `{y \| y i = x}` does not split `I`. -/ theorem split_of_not_mem_Ioo (h : x ∉ Ioo (I.lower i) (I.upper i)) : split I i x = ⊤ := by refine ((isPartitionTop I).eq_of_boxes_subset fun J hJ => ?_).symm rcases mem_top.1 hJ with rfl; clear hJ rw [mem_boxes, mem_split_iff]	rw [mem_Ioo, not_and_or, not_lt, not_lt] at h cases h <;> [right; left]	Mathlib/Analysis/BoxIntegral/Partition/Split.lean	188	189
/- Copyright (c) 2020 Kim Morrison. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johan Commelin, Kim Morrison -/ import Mathlib.Algebra.Category.Ring.Colimits import Mathlib.Algebra.Category.Ring.Instances import Mathlib.Algebra.Category.Ring.Limits import Mathlib.Algebra.Ring.Subring.Basic import Mathlib.RingTheory.Localization.AtPrime import Mathlib.RingTheory.Spectrum.Prime.Topology import Mathlib.Topology.Sheaves.LocalPredicate /-! # The structure sheaf on `PrimeSpectrum R`. We define the structure sheaf on `TopCat.of (PrimeSpectrum R)`, for a commutative ring `R` and prove basic properties about it. We define this as a subsheaf of the sheaf of dependent functions into the localizations, cut out by the condition that the function must be locally equal to a ratio of elements of `R`. Because the condition "is equal to a fraction" passes to smaller open subsets, the subset of functions satisfying this condition is automatically a subpresheaf. Because the condition "is locally equal to a fraction" is local, it is also a subsheaf. (It may be helpful to refer back to `Mathlib/Topology/Sheaves/SheafOfFunctions.lean`, where we show that dependent functions into any type family form a sheaf, and also `Mathlib/Topology/Sheaves/LocalPredicate.lean`, where we characterise the predicates which pick out sub-presheaves and sub-sheaves of these sheaves.) We also set up the ring structure, obtaining `structureSheaf : Sheaf CommRingCat (PrimeSpectrum.Top R)`. We then construct two basic isomorphisms, relating the structure sheaf to the underlying ring `R`. First, `StructureSheaf.stalkIso` gives an isomorphism between the stalk of the structure sheaf at a point `p` and the localization of `R` at the prime ideal `p`. Second, `StructureSheaf.basicOpenIso` gives an isomorphism between the structure sheaf on `basicOpen f` and the localization of `R` at the submonoid of powers of `f`. ## References * [Robin Hartshorne, Algebraic Geometry][Har77] -/ universe u noncomputable section variable (R : Type u) [CommRing R] open TopCat open TopologicalSpace open CategoryTheory open Opposite namespace AlgebraicGeometry /-- The prime spectrum, just as a topological space. -/ def PrimeSpectrum.Top : TopCat := TopCat.of (PrimeSpectrum R) namespace StructureSheaf /-- The type family over `PrimeSpectrum R` consisting of the localization over each point. -/ def Localizations (P : PrimeSpectrum.Top R) : Type u := Localization.AtPrime P.asIdeal instance commRingLocalizations (P : PrimeSpectrum.Top R) : CommRing <\| Localizations R P := inferInstanceAs <\| CommRing <\| Localization.AtPrime P.asIdeal instance localRingLocalizations (P : PrimeSpectrum.Top R) : IsLocalRing <\| Localizations R P := inferInstanceAs <\| IsLocalRing <\| Localization.AtPrime P.asIdeal instance (P : PrimeSpectrum.Top R) : Inhabited (Localizations R P) := ⟨1⟩ instance (U : Opens (PrimeSpectrum.Top R)) (x : U) : Algebra R (Localizations R x) := inferInstanceAs <\| Algebra R (Localization.AtPrime x.1.asIdeal) instance (U : Opens (PrimeSpectrum.Top R)) (x : U) : IsLocalization.AtPrime (Localizations R x) (x : PrimeSpectrum.Top R).asIdeal := Localization.isLocalization variable {R} /-- The predicate saying that a dependent function on an open `U` is realised as a fixed fraction `r / s` in each of the stalks (which are localizations at various prime ideals). -/ def IsFraction {U : Opens (PrimeSpectrum.Top R)} (f : ∀ x : U, Localizations R x) : Prop := ∃ r s : R, ∀ x : U, ¬s ∈ x.1.asIdeal ∧ f x * algebraMap _ _ s = algebraMap _ _ r theorem IsFraction.eq_mk' {U : Opens (PrimeSpectrum.Top R)} {f : ∀ x : U, Localizations R x} (hf : IsFraction f) : ∃ r s : R, ∀ x : U, ∃ hs : s ∉ x.1.asIdeal, f x = IsLocalization.mk' (Localization.AtPrime _) r (⟨s, hs⟩ : (x : PrimeSpectrum.Top R).asIdeal.primeCompl) := by rcases hf with ⟨r, s, h⟩ refine ⟨r, s, fun x => ⟨(h x).1, (IsLocalization.mk'_eq_iff_eq_mul.mpr ?_).symm⟩⟩ exact (h x).2.symm variable (R) /-- The predicate `IsFraction` is "prelocal", in the sense that if it holds on `U` it holds on any open subset `V` of `U`. -/ def isFractionPrelocal : PrelocalPredicate (Localizations R) where pred {_} f := IsFraction f res := by rintro V U i f ⟨r, s, w⟩; exact ⟨r, s, fun x => w (i x)⟩ /-- We will define the structure sheaf as the subsheaf of all dependent functions in `Π x : U, Localizations R x` consisting of those functions which can locally be expressed as a ratio of (the images in the localization of) elements of `R`. Quoting Hartshorne: For an open set $U ⊆ Spec A$, we define $𝒪(U)$ to be the set of functions $s : U → ⨆_{𝔭 ∈ U} A_𝔭$, such that $s(𝔭) ∈ A_𝔭$ for each $𝔭$, and such that $s$ is locally a quotient of elements of $A$: to be precise, we require that for each $𝔭 ∈ U$, there is a neighborhood $V$ of $𝔭$, contained in $U$, and elements $a, f ∈ A$, such that for each $𝔮 ∈ V, f ∉ 𝔮$, and $s(𝔮) = a/f$ in $A_𝔮$. Now Hartshorne had the disadvantage of not knowing about dependent functions, so we replace his circumlocution about functions into a disjoint union with `Π x : U, Localizations x`. -/ def isLocallyFraction : LocalPredicate (Localizations R) := (isFractionPrelocal R).sheafify @[simp] theorem isLocallyFraction_pred {U : Opens (PrimeSpectrum.Top R)} (f : ∀ x : U, Localizations R x) : (isLocallyFraction R).pred f = ∀ x : U, ∃ (V : _) (_ : x.1 ∈ V) (i : V ⟶ U), ∃ r s : R, ∀ y : V, ¬s ∈ y.1.asIdeal ∧ f (i y : U) * algebraMap _ _ s = algebraMap _ _ r := rfl /-- The functions satisfying `isLocallyFraction` form a subring. -/ def sectionsSubring (U : (Opens (PrimeSpectrum.Top R))ᵒᵖ) : Subring (∀ x : U.unop, Localizations R x) where carrier := { f \| (isLocallyFraction R).pred f } zero_mem' := by refine fun x => ⟨unop U, x.2, 𝟙 _, 0, 1, fun y => ⟨?_, ?_⟩⟩ · rw [← Ideal.ne_top_iff_one]; exact y.1.isPrime.1 · simp one_mem' := by refine fun x => ⟨unop U, x.2, 𝟙 _, 1, 1, fun y => ⟨?_, ?_⟩⟩ · rw [← Ideal.ne_top_iff_one]; exact y.1.isPrime.1 · simp add_mem' := by intro a b ha hb x rcases ha x with ⟨Va, ma, ia, ra, sa, wa⟩ rcases hb x with ⟨Vb, mb, ib, rb, sb, wb⟩ refine ⟨Va ⊓ Vb, ⟨ma, mb⟩, Opens.infLELeft _ _ ≫ ia, ra * sb + rb * sa, sa * sb, ?_⟩ intro ⟨y, hy⟩ rcases wa (Opens.infLELeft _ _ ⟨y, hy⟩) with ⟨nma, wa⟩ rcases wb (Opens.infLERight _ _ ⟨y, hy⟩) with ⟨nmb, wb⟩ fconstructor · intro H; cases y.isPrime.mem_or_mem H <;> contradiction · simp only [Opens.apply_mk, Pi.add_apply, RingHom.map_mul, add_mul, RingHom.map_add] at wa wb ⊢ rw [← wa, ← wb] simp only [mul_assoc] congr 2 rw [mul_comm] neg_mem' := by intro a ha x rcases ha x with ⟨V, m, i, r, s, w⟩ refine ⟨V, m, i, -r, s, ?_⟩ intro y rcases w y with ⟨nm, w⟩ fconstructor · exact nm · simp only [RingHom.map_neg, Pi.neg_apply] rw [← w] simp only [neg_mul] mul_mem' := by intro a b ha hb x rcases ha x with ⟨Va, ma, ia, ra, sa, wa⟩ rcases hb x with ⟨Vb, mb, ib, rb, sb, wb⟩ refine ⟨Va ⊓ Vb, ⟨ma, mb⟩, Opens.infLELeft _ _ ≫ ia, ra * rb, sa * sb, ?_⟩ intro ⟨y, hy⟩ rcases wa (Opens.infLELeft _ _ ⟨y, hy⟩) with ⟨nma, wa⟩ rcases wb (Opens.infLERight _ _ ⟨y, hy⟩) with ⟨nmb, wb⟩ fconstructor · intro H; cases y.isPrime.mem_or_mem H <;> contradiction · simp only [Opens.apply_mk, Pi.mul_apply, RingHom.map_mul] at wa wb ⊢ rw [← wa, ← wb] simp only [mul_left_comm, mul_assoc, mul_comm] end StructureSheaf open StructureSheaf /-- The structure sheaf (valued in `Type`, not yet `CommRingCat`) is the subsheaf consisting of functions satisfying `isLocallyFraction`. -/ def structureSheafInType : Sheaf (Type u) (PrimeSpectrum.Top R) := subsheafToTypes (isLocallyFraction R) instance commRingStructureSheafInTypeObj (U : (Opens (PrimeSpectrum.Top R))ᵒᵖ) : CommRing ((structureSheafInType R).1.obj U) := (sectionsSubring R U).toCommRing open PrimeSpectrum /-- The structure presheaf, valued in `CommRingCat`, constructed by dressing up the `Type` valued structure presheaf. -/ @[simps obj_carrier] def structurePresheafInCommRing : Presheaf CommRingCat (PrimeSpectrum.Top R) where obj U := CommRingCat.of ((structureSheafInType R).1.obj U) map {_ _} i := CommRingCat.ofHom { toFun := (structureSheafInType R).1.map i map_zero' := rfl map_add' := fun _ _ => rfl map_one' := rfl map_mul' := fun _ _ => rfl } /-- Some glue, verifying that the structure presheaf valued in `CommRingCat` agrees with the `Type` valued structure presheaf. -/ def structurePresheafCompForget : structurePresheafInCommRing R ⋙ forget CommRingCat ≅ (structureSheafInType R).1 := NatIso.ofComponents fun _ => Iso.refl _ open TopCat.Presheaf /-- The structure sheaf on $Spec R$, valued in `CommRingCat`. This is provided as a bundled `SheafedSpace` as `Spec.SheafedSpace R` later. -/ def Spec.structureSheaf : Sheaf CommRingCat (PrimeSpectrum.Top R) := ⟨structurePresheafInCommRing R, (-- We check the sheaf condition under `forget CommRingCat`. isSheaf_iff_isSheaf_comp _ _).mpr (isSheaf_of_iso (structurePresheafCompForget R).symm (structureSheafInType R).cond)⟩ open Spec (structureSheaf) namespace StructureSheaf @[simp] theorem res_apply (U V : Opens (PrimeSpectrum.Top R)) (i : V ⟶ U) (s : (structureSheaf R).1.obj (op U)) (x : V) : ((structureSheaf R).1.map i.op s).1 x = (s.1 (i x) :) := rfl /- Notation in this comment X = Spec R OX = structure sheaf In the following we construct an isomorphism between OX_p and R_p given any point p corresponding to a prime ideal in R. We do this via 8 steps: 1. def const (f g : R) (V) (hv : V ≤ D_g) : OX(V) [for api] 2. def toOpen (U) : R ⟶ OX(U) 3. [2] def toStalk (p : Spec R) : R ⟶ OX_p 4. [2] def toBasicOpen (f : R) : R_f ⟶ OX(D_f) 5. [3] def localizationToStalk (p : Spec R) : R_p ⟶ OX_p 6. def openToLocalization (U) (p) (hp : p ∈ U) : OX(U) ⟶ R_p 7. [6] def stalkToFiberRingHom (p : Spec R) : OX_p ⟶ R_p 8. [5,7] def stalkIso (p : Spec R) : OX_p ≅ R_p In the square brackets we list the dependencies of a construction on the previous steps. -/ /-- The section of `structureSheaf R` on an open `U` sending each `x ∈ U` to the element `f/g` in the localization of `R` at `x`. -/ def const (f g : R) (U : Opens (PrimeSpectrum.Top R)) (hu : ∀ x ∈ U, g ∈ (x : PrimeSpectrum.Top R).asIdeal.primeCompl) : (structureSheaf R).1.obj (op U) := ⟨fun x => IsLocalization.mk' _ f ⟨g, hu x x.2⟩, fun x => ⟨U, x.2, 𝟙 _, f, g, fun y => ⟨hu y y.2, IsLocalization.mk'_spec _ _ _⟩⟩⟩ @[simp] theorem const_apply (f g : R) (U : Opens (PrimeSpectrum.Top R)) (hu : ∀ x ∈ U, g ∈ (x : PrimeSpectrum.Top R).asIdeal.primeCompl) (x : U) : (const R f g U hu).1 x = IsLocalization.mk' (Localization.AtPrime x.1.asIdeal) f ⟨g, hu x x.2⟩ := rfl theorem const_apply' (f g : R) (U : Opens (PrimeSpectrum.Top R)) (hu : ∀ x ∈ U, g ∈ (x : PrimeSpectrum.Top R).asIdeal.primeCompl) (x : U) (hx : g ∈ (x : PrimeSpectrum.Top R).asIdeal.primeCompl) : (const R f g U hu).1 x = IsLocalization.mk' _ f ⟨g, hx⟩ := rfl theorem exists_const (U) (s : (structureSheaf R).1.obj (op U)) (x : PrimeSpectrum.Top R) (hx : x ∈ U) : ∃ (V : Opens (PrimeSpectrum.Top R)) (_ : x ∈ V) (i : V ⟶ U) (f g : R) (hg : _), const R f g V hg = (structureSheaf R).1.map i.op s := let ⟨V, hxV, iVU, f, g, hfg⟩ := s.2 ⟨x, hx⟩ ⟨V, hxV, iVU, f, g, fun y hyV => (hfg ⟨y, hyV⟩).1, Subtype.eq <\| funext fun y => IsLocalization.mk'_eq_iff_eq_mul.2 <\| Eq.symm <\| (hfg y).2⟩ @[simp] theorem res_const (f g : R) (U hu V hv i) : (structureSheaf R).1.map i (const R f g U hu) = const R f g V hv := rfl theorem res_const' (f g : R) (V hv) : (structureSheaf R).1.map (homOfLE hv).op (const R f g (PrimeSpectrum.basicOpen g) fun _ => id) = const R f g V hv := rfl theorem const_zero (f : R) (U hu) : const R 0 f U hu = 0 := Subtype.eq <\| funext fun x => IsLocalization.mk'_eq_iff_eq_mul.2 <\| by rw [RingHom.map_zero] exact (mul_eq_zero_of_left rfl ((algebraMap R (Localizations R x)) _)).symm theorem const_self (f : R) (U hu) : const R f f U hu = 1 := Subtype.eq <\| funext fun _ => IsLocalization.mk'_self _ _ theorem const_one (U) : (const R 1 1 U fun _ _ => Submonoid.one_mem _) = 1 := const_self R 1 U _ theorem const_add (f₁ f₂ g₁ g₂ : R) (U hu₁ hu₂) : const R f₁ g₁ U hu₁ + const R f₂ g₂ U hu₂ = const R (f₁ * g₂ + f₂ * g₁) (g₁ * g₂) U fun x hx => Submonoid.mul_mem _ (hu₁ x hx) (hu₂ x hx) := Subtype.eq <\| funext fun x => Eq.symm <\| IsLocalization.mk'_add _ _ ⟨g₁, hu₁ x x.2⟩ ⟨g₂, hu₂ x x.2⟩ theorem const_mul (f₁ f₂ g₁ g₂ : R) (U hu₁ hu₂) : const R f₁ g₁ U hu₁ * const R f₂ g₂ U hu₂ = const R (f₁ * f₂) (g₁ * g₂) U fun x hx => Submonoid.mul_mem _ (hu₁ x hx) (hu₂ x hx) := Subtype.eq <\| funext fun x => Eq.symm <\| IsLocalization.mk'_mul _ f₁ f₂ ⟨g₁, hu₁ x x.2⟩ ⟨g₂, hu₂ x x.2⟩ theorem const_ext {f₁ f₂ g₁ g₂ : R} {U hu₁ hu₂} (h : f₁ * g₂ = f₂ * g₁) : const R f₁ g₁ U hu₁ = const R f₂ g₂ U hu₂ := Subtype.eq <\| funext fun x => IsLocalization.mk'_eq_of_eq (by rw [mul_comm, Subtype.coe_mk, ← h, mul_comm, Subtype.coe_mk]) theorem const_congr {f₁ f₂ g₁ g₂ : R} {U hu} (hf : f₁ = f₂) (hg : g₁ = g₂) : const R f₁ g₁ U hu = const R f₂ g₂ U (hg ▸ hu) := by substs hf hg; rfl theorem const_mul_rev (f g : R) (U hu₁ hu₂) : const R f g U hu₁ * const R g f U hu₂ = 1 := by rw [const_mul, const_congr R rfl (mul_comm g f), const_self] theorem const_mul_cancel (f g₁ g₂ : R) (U hu₁ hu₂) : const R f g₁ U hu₁ * const R g₁ g₂ U hu₂ = const R f g₂ U hu₂ := by rw [const_mul, const_ext]; rw [mul_assoc] theorem const_mul_cancel' (f g₁ g₂ : R) (U hu₁ hu₂) : const R g₁ g₂ U hu₂ * const R f g₁ U hu₁ = const R f g₂ U hu₂ := by rw [mul_comm, const_mul_cancel] /-- The canonical ring homomorphism interpreting an element of `R` as a section of the structure sheaf. -/ def toOpen (U : Opens (PrimeSpectrum.Top R)) : CommRingCat.of R ⟶ (structureSheaf R).1.obj (op U) := CommRingCat.ofHom { toFun f := ⟨fun _ => algebraMap R _ f, fun x => ⟨U, x.2, 𝟙 _, f, 1, fun y => ⟨(Ideal.ne_top_iff_one _).1 y.1.2.1, by simp [RingHom.map_one, mul_one]⟩⟩⟩ map_one' := Subtype.eq <\| funext fun _ => RingHom.map_one _ map_mul' _ _ := Subtype.eq <\| funext fun _ => RingHom.map_mul _ _ _ map_zero' := Subtype.eq <\| funext fun _ => RingHom.map_zero _ map_add' _ _ := Subtype.eq <\| funext fun _ => RingHom.map_add _ _ _ } @[simp] theorem toOpen_res (U V : Opens (PrimeSpectrum.Top R)) (i : V ⟶ U) : toOpen R U ≫ (structureSheaf R).1.map i.op = toOpen R V := rfl @[simp] theorem toOpen_apply (U : Opens (PrimeSpectrum.Top R)) (f : R) (x : U) : (toOpen R U f).1 x = algebraMap _ _ f := rfl theorem toOpen_eq_const (U : Opens (PrimeSpectrum.Top R)) (f : R) : toOpen R U f = const R f 1 U fun x _ => (Ideal.ne_top_iff_one _).1 x.2.1 := Subtype.eq <\| funext fun _ => Eq.symm <\| IsLocalization.mk'_one _ f /-- The canonical ring homomorphism interpreting an element of `R` as an element of the stalk of `structureSheaf R` at `x`. -/ def toStalk (x : PrimeSpectrum.Top R) : CommRingCat.of R ⟶ (structureSheaf R).presheaf.stalk x := (toOpen R ⊤ ≫ (structureSheaf R).presheaf.germ _ x (by trivial)) @[simp] theorem toOpen_germ (U : Opens (PrimeSpectrum.Top R)) (x : PrimeSpectrum.Top R) (hx : x ∈ U) : toOpen R U ≫ (structureSheaf R).presheaf.germ U x hx = toStalk R x := by rw [← toOpen_res R ⊤ U (homOfLE le_top : U ⟶ ⊤), Category.assoc, Presheaf.germ_res]; rfl @[simp] theorem germ_toOpen (U : Opens (PrimeSpectrum.Top R)) (x : PrimeSpectrum.Top R) (hx : x ∈ U) (f : R) : (structureSheaf R).presheaf.germ U x hx (toOpen R U f) = toStalk R x f := by rw [← toOpen_germ]; rfl theorem toOpen_Γgerm_apply (x : PrimeSpectrum.Top R) (f : R) : (structureSheaf R).presheaf.Γgerm x (toOpen R ⊤ f) = toStalk R x f := rfl theorem isUnit_to_basicOpen_self (f : R) : IsUnit (toOpen R (PrimeSpectrum.basicOpen f) f) := isUnit_of_mul_eq_one _ (const R 1 f (PrimeSpectrum.basicOpen f) fun _ => id) <\| by rw [toOpen_eq_const, const_mul_rev] theorem isUnit_toStalk (x : PrimeSpectrum.Top R) (f : x.asIdeal.primeCompl) : IsUnit (toStalk R x (f : R)) := by rw [← germ_toOpen R (PrimeSpectrum.basicOpen (f : R)) x f.2 (f : R)] exact RingHom.isUnit_map _ (isUnit_to_basicOpen_self R f) /-- The canonical ring homomorphism from the localization of `R` at `p` to the stalk of the structure sheaf at the point `p`. -/ def localizationToStalk (x : PrimeSpectrum.Top R) : CommRingCat.of (Localization.AtPrime x.asIdeal) ⟶ (structureSheaf R).presheaf.stalk x := CommRingCat.ofHom <\| show Localization.AtPrime x.asIdeal →+* _ from IsLocalization.lift (isUnit_toStalk R x) @[simp] theorem localizationToStalk_of (x : PrimeSpectrum.Top R) (f : R) : localizationToStalk R x (algebraMap _ (Localization _) f) = toStalk R x f := IsLocalization.lift_eq (S := Localization x.asIdeal.primeCompl) _ f @[simp] theorem localizationToStalk_mk' (x : PrimeSpectrum.Top R) (f : R) (s : x.asIdeal.primeCompl) : localizationToStalk R x (IsLocalization.mk' (Localization.AtPrime x.asIdeal) f s) = (structureSheaf R).presheaf.germ (PrimeSpectrum.basicOpen (s : R)) x s.2 (const R f s (PrimeSpectrum.basicOpen s) fun _ => id) := (IsLocalization.lift_mk'_spec (S := Localization.AtPrime x.asIdeal) _ _ _ _).2 <\| by rw [← germ_toOpen R (PrimeSpectrum.basicOpen s) x s.2, ← germ_toOpen R (PrimeSpectrum.basicOpen s) x s.2, ← RingHom.map_mul, toOpen_eq_const, toOpen_eq_const, const_mul_cancel'] /-- The ring homomorphism that takes a section of the structure sheaf of `R` on the open set `U`, implemented as a subtype of dependent functions to localizations at prime ideals, and evaluates the section on the point corresponding to a given prime ideal. -/ def openToLocalization (U : Opens (PrimeSpectrum.Top R)) (x : PrimeSpectrum.Top R) (hx : x ∈ U) : (structureSheaf R).1.obj (op U) ⟶ CommRingCat.of (Localization.AtPrime x.asIdeal) := CommRingCat.ofHom { toFun s := (s.1 ⟨x, hx⟩ :) map_one' := rfl map_mul' _ _ := rfl map_zero' := rfl map_add' _ _ := rfl } @[simp] theorem coe_openToLocalization (U : Opens (PrimeSpectrum.Top R)) (x : PrimeSpectrum.Top R) (hx : x ∈ U) : (openToLocalization R U x hx : (structureSheaf R).1.obj (op U) → Localization.AtPrime x.asIdeal) = fun s => s.1 ⟨x, hx⟩ := rfl theorem openToLocalization_apply (U : Opens (PrimeSpectrum.Top R)) (x : PrimeSpectrum.Top R) (hx : x ∈ U) (s : (structureSheaf R).1.obj (op U)) : openToLocalization R U x hx s = s.1 ⟨x, hx⟩ := rfl /-- The ring homomorphism from the stalk of the structure sheaf of `R` at a point corresponding to a prime ideal `p` to the localization of `R` at `p`, formed by gluing the `openToLocalization` maps. -/ def stalkToFiberRingHom (x : PrimeSpectrum.Top R) : (structureSheaf R).presheaf.stalk x ⟶ CommRingCat.of (Localization.AtPrime x.asIdeal) := Limits.colimit.desc ((OpenNhds.inclusion x).op ⋙ (structureSheaf R).1) { pt := _ ι := { app := fun U => openToLocalization R ((OpenNhds.inclusion _).obj (unop U)) x (unop U).2 } } @[simp] theorem germ_comp_stalkToFiberRingHom (U : Opens (PrimeSpectrum.Top R)) (x : PrimeSpectrum.Top R) (hx : x ∈ U) : (structureSheaf R).presheaf.germ U x hx ≫ stalkToFiberRingHom R x = openToLocalization R U x hx := Limits.colimit.ι_desc _ _ @[simp] theorem stalkToFiberRingHom_germ (U : Opens (PrimeSpectrum.Top R)) (x : PrimeSpectrum.Top R) (hx : x ∈ U) (s : (structureSheaf R).1.obj (op U)) : stalkToFiberRingHom R x ((structureSheaf R).presheaf.germ U x hx s) = s.1 ⟨x, hx⟩ := RingHom.ext_iff.mp (CommRingCat.hom_ext_iff.mp (germ_comp_stalkToFiberRingHom R U x hx)) s @[simp] theorem toStalk_comp_stalkToFiberRingHom (x : PrimeSpectrum.Top R) : toStalk R x ≫ stalkToFiberRingHom R x = CommRingCat.ofHom (algebraMap _ _) := by rw [toStalk, Category.assoc, germ_comp_stalkToFiberRingHom]; rfl @[simp] theorem stalkToFiberRingHom_toStalk (x : PrimeSpectrum.Top R) (f : R) : stalkToFiberRingHom R x (toStalk R x f) = algebraMap _ _ f := RingHom.ext_iff.1 (CommRingCat.hom_ext_iff.mp (toStalk_comp_stalkToFiberRingHom R x)) _ /-- The ring isomorphism between the stalk of the structure sheaf of `R` at a point `p` corresponding to a prime ideal in `R` and the localization of `R` at `p`. -/ @[simps] def stalkIso (x : PrimeSpectrum.Top R) : (structureSheaf R).presheaf.stalk x ≅ CommRingCat.of (Localization.AtPrime x.asIdeal) where hom := stalkToFiberRingHom R x inv := localizationToStalk R x hom_inv_id := by apply stalk_hom_ext intro U hxU ext s dsimp only [CommRingCat.hom_comp, RingHom.coe_comp, Function.comp_apply, CommRingCat.hom_id, RingHom.coe_id, id_eq] rw [stalkToFiberRingHom_germ] obtain ⟨V, hxV, iVU, f, g, (hg : V ≤ PrimeSpectrum.basicOpen _), hs⟩ := exists_const _ _ s x hxU have := res_apply R U V iVU s ⟨x, hxV⟩ dsimp only [isLocallyFraction_pred, Opens.apply_mk] at this rw [← this, ← hs, const_apply, localizationToStalk_mk'] refine (structureSheaf R).presheaf.germ_ext V hxV (homOfLE hg) iVU ?_ rw [← hs, res_const'] inv_hom_id := CommRingCat.hom_ext <\| @IsLocalization.ringHom_ext R _ x.asIdeal.primeCompl (Localization.AtPrime x.asIdeal) _ _ (Localization.AtPrime x.asIdeal) _ _ (RingHom.comp (stalkToFiberRingHom R x).hom (localizationToStalk R x).hom) (RingHom.id (Localization.AtPrime _)) <\| by ext f rw [RingHom.comp_apply, RingHom.comp_apply, localizationToStalk_of, stalkToFiberRingHom_toStalk, RingHom.comp_apply, RingHom.id_apply] instance (x : PrimeSpectrum R) : IsIso (stalkToFiberRingHom R x) := (stalkIso R x).isIso_hom instance (x : PrimeSpectrum R) : IsLocalHom (stalkToFiberRingHom R x).hom := isLocalHom_of_isIso _ instance (x : PrimeSpectrum R) : IsIso (localizationToStalk R x) := (stalkIso R x).isIso_inv instance (x : PrimeSpectrum R) : IsLocalHom (localizationToStalk R x).hom := isLocalHom_of_isIso _ @[simp, reassoc] theorem stalkToFiberRingHom_localizationToStalk (x : PrimeSpectrum.Top R) : stalkToFiberRingHom R x ≫ localizationToStalk R x = 𝟙 _ := (stalkIso R x).hom_inv_id @[simp, reassoc] theorem localizationToStalk_stalkToFiberRingHom (x : PrimeSpectrum.Top R) : localizationToStalk R x ≫ stalkToFiberRingHom R x = 𝟙 _ := (stalkIso R x).inv_hom_id /-- The canonical ring homomorphism interpreting `s ∈ R_f` as a section of the structure sheaf on the basic open defined by `f ∈ R`. -/ def toBasicOpen (f : R) : Localization.Away f →+* (structureSheaf R).1.obj (op <\| PrimeSpectrum.basicOpen f) := IsLocalization.Away.lift f (isUnit_to_basicOpen_self R f) @[simp] theorem toBasicOpen_mk' (s f : R) (g : Submonoid.powers s) : toBasicOpen R s (IsLocalization.mk' (Localization.Away s) f g) = const R f g (PrimeSpectrum.basicOpen s) fun _ hx => Submonoid.powers_le.2 hx g.2 := (IsLocalization.lift_mk'_spec _ _ _ _).2 <\| by rw [toOpen_eq_const, toOpen_eq_const, const_mul_cancel'] @[simp] theorem localization_toBasicOpen (f : R) : RingHom.comp (toBasicOpen R f) (algebraMap R (Localization.Away f)) = (toOpen R (PrimeSpectrum.basicOpen f)).hom := RingHom.ext fun g => by rw [toBasicOpen, IsLocalization.Away.lift, RingHom.comp_apply, IsLocalization.lift_eq] @[simp] theorem toBasicOpen_to_map (s f : R) : toBasicOpen R s (algebraMap R (Localization.Away s) f) = const R f 1 (PrimeSpectrum.basicOpen s) fun _ _ => Submonoid.one_mem _ := (IsLocalization.lift_eq _ _).trans <\| toOpen_eq_const _ _ _ -- The proof here follows the argument in Hartshorne's Algebraic Geometry, Proposition II.2.2. theorem toBasicOpen_injective (f : R) : Function.Injective (toBasicOpen R f) := by intro s t h_eq obtain ⟨a, ⟨b, hb⟩, rfl⟩ := IsLocalization.mk'_surjective (Submonoid.powers f) s obtain ⟨c, ⟨d, hd⟩, rfl⟩ := IsLocalization.mk'_surjective (Submonoid.powers f) t simp only [toBasicOpen_mk'] at h_eq rw [IsLocalization.eq] -- We know that the fractions `a/b` and `c/d` are equal as sections of the structure sheaf on -- `basicOpen f`. We need to show that they agree as elements in the localization of `R` at `f`. -- This amounts showing that `r * (d * a) = r * (b * c)`, for some power `r = f ^ n` of `f`. -- We define `I` as the ideal of all elements `r` satisfying the above equation. let I : Ideal R := { carrier := { r : R \| r * (d * a) = r * (b * c) } zero_mem' := by simp only [Set.mem_setOf_eq, zero_mul] add_mem' := fun {r₁ r₂} hr₁ hr₂ => by dsimp at hr₁ hr₂ ⊢; simp only [add_mul, hr₁, hr₂] smul_mem' := fun {r₁ r₂} hr₂ => by dsimp at hr₂ ⊢; simp only [mul_assoc, hr₂] } -- Our claim now reduces to showing that `f` is contained in the radical of `I` suffices f ∈ I.radical by obtain ⟨n, hn⟩ := this exact ⟨⟨f ^ n, n, rfl⟩, hn⟩ rw [← PrimeSpectrum.vanishingIdeal_zeroLocus_eq_radical, PrimeSpectrum.mem_vanishingIdeal] intro p hfp contrapose hfp rw [PrimeSpectrum.mem_zeroLocus, Set.not_subset] have := congr_fun (congr_arg Subtype.val h_eq) ⟨p, hfp⟩ dsimp at this rw [IsLocalization.eq (S := Localization.AtPrime p.asIdeal)] at this obtain ⟨r, hr⟩ := this exact ⟨r.1, hr, r.2⟩ /- Auxiliary lemma for surjectivity of `toBasicOpen`. Every section can locally be represented on basic opens `basicOpen g` as a fraction `f/g` -/ theorem locally_const_basicOpen (U : Opens (PrimeSpectrum.Top R)) (s : (structureSheaf R).1.obj (op U)) (x : U) : ∃ (f g : R) (i : PrimeSpectrum.basicOpen g ⟶ U), x.1 ∈ PrimeSpectrum.basicOpen g ∧ (const R f g (PrimeSpectrum.basicOpen g) fun _ hy => hy) = (structureSheaf R).1.map i.op s := by -- First, any section `s` can be represented as a fraction `f/g` on some open neighborhood of `x` -- and we may pass to a `basicOpen h`, since these form a basis obtain ⟨V, hxV : x.1 ∈ V.1, iVU, f, g, hVDg : V ≤ PrimeSpectrum.basicOpen g, s_eq⟩ := exists_const R U s x.1 x.2 obtain ⟨_, ⟨h, rfl⟩, hxDh, hDhV : PrimeSpectrum.basicOpen h ≤ V⟩ := PrimeSpectrum.isTopologicalBasis_basic_opens.exists_subset_of_mem_open hxV V.2 -- The problem is of course, that `g` and `h` don't need to coincide. -- But, since `basicOpen h ≤ basicOpen g`, some power of `h` must be a multiple of `g` obtain ⟨n, hn⟩ := (PrimeSpectrum.basicOpen_le_basicOpen_iff h g).mp (Set.Subset.trans hDhV hVDg) -- Actually, we will need a nonzero power of `h`. -- This is because we will need the equality `basicOpen (h ^ n) = basicOpen h`, which only -- holds for a nonzero power `n`. We therefore artificially increase `n` by one. replace hn := Ideal.mul_mem_right h (Ideal.span {g}) hn rw [← pow_succ, Ideal.mem_span_singleton'] at hn obtain ⟨c, hc⟩ := hn have basic_opens_eq := PrimeSpectrum.basicOpen_pow h (n + 1) (by omega) have i_basic_open := eqToHom basic_opens_eq ≫ homOfLE hDhV -- We claim that `(f * c) / h ^ (n+1)` is our desired representation use f * c, h ^ (n + 1), i_basic_open ≫ iVU, (basic_opens_eq.symm.le :) hxDh rw [op_comp, Functor.map_comp, ConcreteCategory.comp_apply, ← s_eq, res_const] -- Note that the last rewrite here generated an additional goal, which was a parameter -- of `res_const`. We prove this goal first swap · intro y hy rw [basic_opens_eq] at hy exact (Set.Subset.trans hDhV hVDg :) hy -- All that is left is a simple calculation apply const_ext rw [mul_assoc f c g, hc] /- Auxiliary lemma for surjectivity of `toBasicOpen`. A local representation of a section `s` as fractions `a i / h i` on finitely many basic opens `basicOpen (h i)` can be "normalized" in such a way that `a i * h j = h i * a j` for all `i, j` -/ theorem normalize_finite_fraction_representation (U : Opens (PrimeSpectrum.Top R)) (s : (structureSheaf R).1.obj (op U)) {ι : Type} (t : Finset ι) (a h : ι → R) (iDh : ∀ i : ι, PrimeSpectrum.basicOpen (h i) ⟶ U) (h_cover : U ≤ ⨆ i ∈ t, PrimeSpectrum.basicOpen (h i)) (hs : ∀ i : ι, (const R (a i) (h i) (PrimeSpectrum.basicOpen (h i)) fun _ hy => hy) = (structureSheaf R).1.map (iDh i).op s) : ∃ (a' h' : ι → R) (iDh' : ∀ i : ι, PrimeSpectrum.basicOpen (h' i) ⟶ U), (U ≤ ⨆ i ∈ t, PrimeSpectrum.basicOpen (h' i)) ∧ (∀ (i) (_ : i ∈ t) (j) (_ : j ∈ t), a' i h' j = h' i * a' j) ∧ ∀ i ∈ t, (structureSheaf R).1.map (iDh' i).op s = const R (a' i) (h' i) (PrimeSpectrum.basicOpen (h' i)) fun _ hy => hy := by -- First we show that the fractions `(a i * h j) / (h i * h j)` and `(h i * a j) / (h i * h j)` -- coincide in the localization of `R` at `h i * h j` have fractions_eq : ∀ i j : ι, IsLocalization.mk' (Localization.Away (h i * h j)) (a i * h j) ⟨h i * h j, Submonoid.mem_powers _⟩ = IsLocalization.mk' _ (h i * a j) ⟨h i * h j, Submonoid.mem_powers _⟩ := by intro i j let D := PrimeSpectrum.basicOpen (h i * h j) let iDi : D ⟶ PrimeSpectrum.basicOpen (h i) := homOfLE (PrimeSpectrum.basicOpen_mul_le_left _ _) let iDj : D ⟶ PrimeSpectrum.basicOpen (h j) := homOfLE (PrimeSpectrum.basicOpen_mul_le_right _ _) -- Crucially, we need injectivity of `toBasicOpen` apply toBasicOpen_injective R (h i * h j) rw [toBasicOpen_mk', toBasicOpen_mk'] simp only [] -- Here, both sides of the equation are equal to a restriction of `s` trans on_goal 1 => convert congr_arg ((structureSheaf R).1.map iDj.op) (hs j).symm using 1 convert congr_arg ((structureSheaf R).1.map iDi.op) (hs i) using 1 all_goals rw [res_const]; apply const_ext; ring -- The remaining two goals were generated during the rewrite of `res_const` -- These can be solved immediately exacts [PrimeSpectrum.basicOpen_mul_le_left _ _, PrimeSpectrum.basicOpen_mul_le_right _ _] -- From the equality in the localization, we obtain for each `(i,j)` some power `(h i * h j) ^ n` -- which equalizes `a i * h j` and `h i * a j` have exists_power : ∀ i j : ι, ∃ n : ℕ, a i * h j * (h i * h j) ^ n = h i * a j * (h i * h j) ^ n := by intro i j obtain ⟨⟨c, n, rfl⟩, hc⟩ := IsLocalization.eq.mp (fractions_eq i j) use n + 1 rw [pow_succ] dsimp at hc convert hc using 1 <;> ring let n := fun p : ι × ι => (exists_power p.1 p.2).choose have n_spec := fun p : ι × ι => (exists_power p.fst p.snd).choose_spec -- We need one power `(h i * h j) ^ N` that works for all pairs `(i,j)` -- Since there are only finitely many indices involved, we can pick the supremum. let N := (t ×ˢ t).sup n have basic_opens_eq : ∀ i : ι, PrimeSpectrum.basicOpen (h i ^ (N + 1)) = PrimeSpectrum.basicOpen (h i) := fun i => PrimeSpectrum.basicOpen_pow _ _ (by omega) -- Expanding the fraction `a i / h i` by the power `(h i) ^ n` gives the desired normalization refine ⟨fun i => a i * h i ^ N, fun i => h i ^ (N + 1), fun i => eqToHom (basic_opens_eq i) ≫ iDh i, ?_, ?_, ?_⟩ · simpa only [basic_opens_eq] using h_cover · intro i hi j hj -- Here we need to show that our new fractions `a i / h i` satisfy the normalization condition -- Of course, the power `N` we used to expand the fractions might be bigger than the power -- `n (i, j)` which was originally chosen. We denote their difference by `k` have n_le_N : n (i, j) ≤ N := Finset.le_sup (Finset.mem_product.mpr ⟨hi, hj⟩) obtain ⟨k, hk⟩ := Nat.le.dest n_le_N simp only [← hk, pow_add, pow_one] -- To accommodate for the difference `k`, we multiply both sides of the equation `n_spec (i, j)` -- by `(h i * h j) ^ k` convert congr_arg (fun z => z * (h i * h j) ^ k) (n_spec (i, j)) using 1 <;> · simp only [n, mul_pow]; ring -- Lastly, we need to show that the new fractions still represent our original `s` intro i _ rw [op_comp, Functor.map_comp, ConcreteCategory.comp_apply, ← hs, res_const] -- additional goal spit out by `res_const` swap · exact (basic_opens_eq i).le apply const_ext dsimp rw [pow_succ] ring -- Porting note: in the following proof there are two places where `⋃ i, ⋃ (hx : i ∈ _), ... ` -- though `hx` is not used in `...` part, it is still required to maintain the structure of -- the original proof in mathlib3. set_option linter.unusedVariables false in -- The proof here follows the argument in Hartshorne's Algebraic Geometry, Proposition II.2.2. theorem toBasicOpen_surjective (f : R) : Function.Surjective (toBasicOpen R f) := by intro s -- In this proof, `basicOpen f` will play two distinct roles: Firstly, it is an open set in the -- prime spectrum. Secondly, it is used as an indexing type for various families of objects -- (open sets, ring elements, ...). In order to make the distinction clear, we introduce a type -- alias `ι` that is used whenever we want think of it as an indexing type. let ι : Type u := PrimeSpectrum.basicOpen f -- First, we pick some cover of basic opens, on which we can represent `s` as a fraction choose a' h' iDh' hxDh' s_eq' using locally_const_basicOpen R (PrimeSpectrum.basicOpen f) s -- Since basic opens are compact, we can pass to a finite subcover obtain ⟨t, ht_cover'⟩ := (PrimeSpectrum.isCompact_basicOpen f).elim_finite_subcover (fun i : ι => PrimeSpectrum.basicOpen (h' i)) (fun i => PrimeSpectrum.isOpen_basicOpen) -- Here, we need to show that our basic opens actually form a cover of `basicOpen f` fun x hx => by rw [Set.mem_iUnion]; exact ⟨⟨x, hx⟩, hxDh' ⟨x, hx⟩⟩ simp only [← Opens.coe_iSup, SetLike.coe_subset_coe] at ht_cover' -- We use the normalization lemma from above to obtain the relation `a i * h j = h i * a j` obtain ⟨a, h, iDh, ht_cover, ah_ha, s_eq⟩ := normalize_finite_fraction_representation R (PrimeSpectrum.basicOpen f) s t a' h' iDh' ht_cover' s_eq' clear s_eq' iDh' hxDh' ht_cover' a' h' simp only [← SetLike.coe_subset_coe, Opens.coe_iSup] at ht_cover replace ht_cover : (PrimeSpectrum.basicOpen f : Set <\| PrimeSpectrum R) ⊆ ⋃ (i : ι) (x : i ∈ t), (PrimeSpectrum.basicOpen (h i) : Set _) := ht_cover -- Next we show that some power of `f` is a linear combination of the `h i` obtain ⟨n, hn⟩ : f ∈ (Ideal.span (h '' ↑t)).radical := by rw [← PrimeSpectrum.vanishingIdeal_zeroLocus_eq_radical, PrimeSpectrum.zeroLocus_span] simp [PrimeSpectrum.basicOpen_eq_zeroLocus_compl] at ht_cover replace ht_cover : (PrimeSpectrum.zeroLocus {f})ᶜ ⊆ ⋃ (i : ι) (x : i ∈ t), (PrimeSpectrum.zeroLocus {h i})ᶜ := ht_cover rw [Set.compl_subset_comm] at ht_cover -- Why doesn't `simp_rw` do this? simp_rw [Set.compl_iUnion, compl_compl, ← PrimeSpectrum.zeroLocus_iUnion, ← Finset.set_biUnion_coe, ← Set.image_eq_iUnion] at ht_cover apply PrimeSpectrum.vanishingIdeal_anti_mono ht_cover exact PrimeSpectrum.subset_vanishingIdeal_zeroLocus {f} (Set.mem_singleton f) replace hn := Ideal.mul_mem_right f _ hn rw [← pow_succ, Ideal.span, Finsupp.mem_span_image_iff_linearCombination] at hn rcases hn with ⟨b, b_supp, hb⟩ rw [Finsupp.linearCombination_apply_of_mem_supported R b_supp] at hb dsimp at hb -- Finally, we have all the ingredients. -- We claim that our preimage is given by `(∑ (i : ι) ∈ t, b i * a i) / f ^ (n+1)` use IsLocalization.mk' (Localization.Away f) (∑ i ∈ t, b i * a i) (⟨f ^ (n + 1), n + 1, rfl⟩ : Submonoid.powers _) rw [toBasicOpen_mk'] -- Since the structure sheaf is a sheaf, we can show the desired equality locally. -- Annoyingly, `Sheaf.eq_of_locally_eq'` requires an open cover indexed by a type, so we need to -- coerce our finset `t` to a type first. let tt := ((t : Set (PrimeSpectrum.basicOpen f)) : Type u) apply (structureSheaf R).eq_of_locally_eq' (fun i : tt => PrimeSpectrum.basicOpen (h i)) (PrimeSpectrum.basicOpen f) fun i : tt => iDh i · -- This feels a little redundant, since already have `ht_cover` as a hypothesis -- Unfortunately, `ht_cover` uses a bounded union over the set `t`, while here we have the -- Union indexed by the type `tt`, so we need some boilerplate to translate one to the other intro x hx rw [SetLike.mem_coe, TopologicalSpace.Opens.mem_iSup] have := ht_cover hx rw [← Finset.set_biUnion_coe, Set.mem_iUnion₂] at this rcases this with ⟨i, i_mem, x_mem⟩ exact ⟨⟨i, i_mem⟩, x_mem⟩ rintro ⟨i, hi⟩ dsimp change (structureSheaf R).1.map (iDh i).op _ = (structureSheaf R).1.map (iDh i).op _ rw [s_eq i hi, res_const] -- Again, `res_const` spits out an additional goal swap · intro y hy change y ∈ PrimeSpectrum.basicOpen (f ^ (n + 1)) rw [PrimeSpectrum.basicOpen_pow f (n + 1) (by omega)] exact (leOfHom (iDh i) :) hy -- The rest of the proof is just computation apply const_ext rw [← hb, Finset.sum_mul, Finset.mul_sum] apply Finset.sum_congr rfl intro j hj rw [mul_assoc, ah_ha j hj i hi] ring instance isIso_toBasicOpen (f : R) : IsIso (CommRingCat.ofHom (toBasicOpen R f)) := haveI : IsIso ((forget CommRingCat).map (CommRingCat.ofHom (toBasicOpen R f))) := (isIso_iff_bijective _).mpr ⟨toBasicOpen_injective R f, toBasicOpen_surjective R f⟩ isIso_of_reflects_iso _ (forget CommRingCat) /-- The ring isomorphism between the structure sheaf on `basicOpen f` and the localization of `R` at the submonoid of powers of `f`. -/ def basicOpenIso (f : R) : (structureSheaf R).1.obj (op (PrimeSpectrum.basicOpen f)) ≅ CommRingCat.of (Localization.Away f) := (asIso (CommRingCat.ofHom (toBasicOpen R f))).symm instance stalkAlgebra (p : PrimeSpectrum R) : Algebra R ((structureSheaf R).presheaf.stalk p) := (toStalk R p).hom.toAlgebra @[simp] theorem stalkAlgebra_map (p : PrimeSpectrum R) (r : R) : algebraMap R ((structureSheaf R).presheaf.stalk p) r = toStalk R p r := rfl /-- Stalk of the structure sheaf at a prime p as localization of R -/ instance IsLocalization.to_stalk (p : PrimeSpectrum R) : IsLocalization.AtPrime ((structureSheaf R).presheaf.stalk p) p.asIdeal := by convert (IsLocalization.isLocalization_iff_of_ringEquiv (S := Localization.AtPrime p.asIdeal) _ (stalkIso R p).symm.commRingCatIsoToRingEquiv).mp Localization.isLocalization apply Algebra.algebra_ext intro rw [stalkAlgebra_map] congr 2 change toStalk R p = _ ≫ (stalkIso R p).inv rw [Iso.eq_comp_inv] exact toStalk_comp_stalkToFiberRingHom R p instance openAlgebra (U : (Opens (PrimeSpectrum R))ᵒᵖ) : Algebra R ((structureSheaf R).val.obj U) := (toOpen R (unop U)).hom.toAlgebra @[simp] theorem openAlgebra_map (U : (Opens (PrimeSpectrum R))ᵒᵖ) (r : R) : algebraMap R ((structureSheaf R).val.obj U) r = toOpen R (unop U) r := rfl /-- Sections of the structure sheaf of Spec R on a basic open as localization of R -/ instance IsLocalization.to_basicOpen (r : R) : IsLocalization.Away r ((structureSheaf R).val.obj (op <\| PrimeSpectrum.basicOpen r)) := by convert (IsLocalization.isLocalization_iff_of_ringEquiv (S := Localization.Away r) _ (basicOpenIso R r).symm.commRingCatIsoToRingEquiv).mp Localization.isLocalization apply Algebra.algebra_ext intro x congr 1 exact (localization_toBasicOpen R r).symm instance to_basicOpen_epi (r : R) : Epi (toOpen R (PrimeSpectrum.basicOpen r)) := ⟨fun _ _ h => CommRingCat.hom_ext (IsLocalization.ringHom_ext (Submonoid.powers r) (CommRingCat.hom_ext_iff.mp h))⟩ @[elementwise] theorem to_global_factors : toOpen R ⊤ = CommRingCat.ofHom (algebraMap R (Localization.Away (1 : R))) ≫ CommRingCat.ofHom (toBasicOpen R (1 : R)) ≫ (structureSheaf R).1.map (eqToHom PrimeSpectrum.basicOpen_one.symm).op := by rw [← Category.assoc] change toOpen R ⊤ = (CommRingCat.ofHom <\| (toBasicOpen R 1).comp (algebraMap R (Localization.Away 1))) ≫ (structureSheaf R).1.map (eqToHom _).op rw [localization_toBasicOpen R, CommRingCat.ofHom_hom, toOpen_res] instance isIso_to_global : IsIso (toOpen R ⊤) := by let hom := CommRingCat.ofHom (algebraMap R (Localization.Away (1 : R))) haveI : IsIso hom := (IsLocalization.atOne R (Localization.Away (1 : R))).toRingEquiv.toCommRingCatIso.isIso_hom rw [to_global_factors R] infer_instance /-- The ring isomorphism between the ring `R` and the global sections `Γ(X, 𝒪ₓ)`. -/ @[simps! inv] def globalSectionsIso : CommRingCat.of R ≅ (structureSheaf R).1.obj (op ⊤) := asIso (toOpen R ⊤) @[simp] theorem globalSectionsIso_hom (R : CommRingCat) : (globalSectionsIso R).hom = toOpen R ⊤ := rfl @[simp, reassoc, elementwise nosimp] theorem toStalk_stalkSpecializes {R : Type} [CommRing R] {x y : PrimeSpectrum R} (h : x ⤳ y) : toStalk R y ≫ (structureSheaf R).presheaf.stalkSpecializes h = toStalk R x := by dsimp [toStalk]; simp [-toOpen_germ] @[simp, reassoc, elementwise nosimp] theorem localizationToStalk_stalkSpecializes {R : Type} [CommRing R] {x y : PrimeSpectrum R} (h : x ⤳ y) : StructureSheaf.localizationToStalk R y ≫ (structureSheaf R).presheaf.stalkSpecializes h = CommRingCat.ofHom (PrimeSpectrum.localizationMapOfSpecializes h) ≫ StructureSheaf.localizationToStalk R x := by ext : 1 apply IsLocalization.ringHom_ext (S := Localization.AtPrime y.asIdeal) y.asIdeal.primeCompl rw [CommRingCat.hom_comp, RingHom.comp_assoc, CommRingCat.hom_comp, RingHom.comp_assoc] dsimp [localizationToStalk, PrimeSpectrum.localizationMapOfSpecializes] rw [IsLocalization.lift_comp, IsLocalization.lift_comp, IsLocalization.lift_comp] exact CommRingCat.hom_ext_iff.mp (toStalk_stalkSpecializes h) @[simp, reassoc, elementwise nosimp] theorem stalkSpecializes_stalk_to_fiber {R : Type} [CommRing R] {x y : PrimeSpectrum R} (h : x ⤳ y) : (structureSheaf R).presheaf.stalkSpecializes h ≫ StructureSheaf.stalkToFiberRingHom R x = StructureSheaf.stalkToFiberRingHom R y ≫ (CommRingCat.ofHom (PrimeSpectrum.localizationMapOfSpecializes h)) := by change _ ≫ (StructureSheaf.stalkIso R x).hom = (StructureSheaf.stalkIso R y).hom ≫ _ rw [← Iso.eq_comp_inv, Category.assoc, ← Iso.inv_comp_eq] exact localizationToStalk_stalkSpecializes h section Comap variable {R} {S : Type u} [CommRing S] {P : Type u} [CommRing P] /-- Given a ring homomorphism `f : R →+ S`, an open set `U` of the prime spectrum of `R` and an open set `V` of the prime spectrum of `S`, such that `V ⊆ (comap f) ⁻¹' U`, we can push a section `s` on `U` to a section on `V`, by composing with `Localization.localRingHom _ _ f` from the left and `comap f` from the right. Explicitly, if `s` evaluates on `comap f p` to `a / b`, its image on `V` evaluates on `p` to `f(a) / f(b)`. At the moment, we work with arbitrary dependent functions `s : Π x : U, Localizations R x`. Below, we prove the predicate `isLocallyFraction` is preserved by this map, hence it can be extended to a morphism between the structure sheaves of `R` and `S`. -/ def comapFun (f : R →+* S) (U : Opens (PrimeSpectrum.Top R)) (V : Opens (PrimeSpectrum.Top S)) (hUV : V.1 ⊆ PrimeSpectrum.comap f ⁻¹' U.1) (s : ∀ x : U, Localizations R x) (y : V) : Localizations S y := Localization.localRingHom (PrimeSpectrum.comap f y.1).asIdeal _ f rfl (s ⟨PrimeSpectrum.comap f y.1, hUV y.2⟩ :) theorem comapFunIsLocallyFraction (f : R →+* S) (U : Opens (PrimeSpectrum.Top R)) (V : Opens (PrimeSpectrum.Top S)) (hUV : V.1 ⊆ PrimeSpectrum.comap f ⁻¹' U.1) (s : ∀ x : U, Localizations R x) (hs : (isLocallyFraction R).toPrelocalPredicate.pred s) : (isLocallyFraction S).toPrelocalPredicate.pred (comapFun f U V hUV s) := by rintro ⟨p, hpV⟩ -- Since `s` is locally fraction, we can find a neighborhood `W` of `PrimeSpectrum.comap f p` -- in `U`, such that `s = a / b` on `W`, for some ring elements `a, b : R`. rcases hs ⟨PrimeSpectrum.comap f p, hUV hpV⟩ with ⟨W, m, iWU, a, b, h_frac⟩ -- We claim that we can write our new section as the fraction `f a / f b` on the neighborhood -- `(comap f) ⁻¹ W ⊓ V` of `p`. refine ⟨Opens.comap (PrimeSpectrum.comap f) W ⊓ V, ⟨m, hpV⟩, Opens.infLERight _ _, f a, f b, ?_⟩ rintro ⟨q, ⟨hqW, hqV⟩⟩ specialize h_frac ⟨PrimeSpectrum.comap f q, hqW⟩ refine ⟨h_frac.1, ?_⟩ dsimp only [comapFun] erw [← Localization.localRingHom_to_map (PrimeSpectrum.comap f q).asIdeal, ← RingHom.map_mul, h_frac.2, Localization.localRingHom_to_map] rfl /-- For a ring homomorphism `f : R →+* S` and open sets `U` and `V` of the prime spectra of `R` and `S` such that `V ⊆ (comap f) ⁻¹ U`, the induced ring homomorphism from the structure sheaf of `R` at `U` to the structure sheaf of `S` at `V`. Explicitly, this map is given as follows: For a point `p : V`, if the section `s` evaluates on `p` to the fraction `a / b`, its image on `V` evaluates on `p` to the fraction `f(a) / f(b)`. -/ def comap (f : R →+* S) (U : Opens (PrimeSpectrum.Top R)) (V : Opens (PrimeSpectrum.Top S)) (hUV : V.1 ⊆ PrimeSpectrum.comap f ⁻¹' U.1) : (structureSheaf R).1.obj (op U) →+* (structureSheaf S).1.obj (op V) where toFun s := ⟨comapFun f U V hUV s.1, comapFunIsLocallyFraction f U V hUV s.1 s.2⟩ map_one' := Subtype.ext <\| funext fun p => by dsimp rw [comapFun, (sectionsSubring R (op U)).coe_one, Pi.one_apply, RingHom.map_one] rfl map_zero' := Subtype.ext <\| funext fun p => by dsimp rw [comapFun, (sectionsSubring R (op U)).coe_zero, Pi.zero_apply, RingHom.map_zero] rfl map_add' s t := Subtype.ext <\| funext fun p => by dsimp rw [comapFun, (sectionsSubring R (op U)).coe_add, Pi.add_apply, RingHom.map_add] rfl map_mul' s t := Subtype.ext <\| funext fun p => by dsimp rw [comapFun, (sectionsSubring R (op U)).coe_mul, Pi.mul_apply, RingHom.map_mul] rfl @[simp] theorem comap_apply (f : R →+* S) (U : Opens (PrimeSpectrum.Top R)) (V : Opens (PrimeSpectrum.Top S)) (hUV : V.1 ⊆ PrimeSpectrum.comap f ⁻¹' U.1) (s : (structureSheaf R).1.obj (op U)) (p : V) : (comap f U V hUV s).1 p = Localization.localRingHom (PrimeSpectrum.comap f p.1).asIdeal _ f rfl (s.1 ⟨PrimeSpectrum.comap f p.1, hUV p.2⟩ :) := rfl theorem comap_const (f : R →+* S) (U : Opens (PrimeSpectrum.Top R)) (V : Opens (PrimeSpectrum.Top S)) (hUV : V.1 ⊆ PrimeSpectrum.comap f ⁻¹' U.1) (a b : R) (hb : ∀ x : PrimeSpectrum R, x ∈ U → b ∈ x.asIdeal.primeCompl) : comap f U V hUV (const R a b U hb) = const S (f a) (f b) V fun p hpV => hb (PrimeSpectrum.comap f p) (hUV hpV) := Subtype.eq <\| funext fun p => by rw [comap_apply, const_apply, const_apply, Localization.localRingHom_mk'] /-- For an inclusion `i : V ⟶ U` between open sets of the prime spectrum of `R`, the comap of the identity from OO_X(U) to OO_X(V) equals as the restriction map of the structure sheaf. This is a generalization of the fact that, for fixed `U`, the comap of the identity from OO_X(U) to OO_X(U) is the identity. -/ theorem comap_id_eq_map (U V : Opens (PrimeSpectrum.Top R)) (iVU : V ⟶ U) : (comap (RingHom.id R) U V fun _ hpV => leOfHom iVU <\| hpV) = ((structureSheaf R).1.map iVU.op).hom := RingHom.ext fun s => Subtype.eq <\| funext fun p => by rw [comap_apply] -- Unfortunately, we cannot use `Localization.localRingHom_id` here, because -- `PrimeSpectrum.comap (RingHom.id R) p` is not definitionally equal to `p`. Instead, we use -- that we can write `s` as a fraction `a/b` in a small neighborhood around `p`. Since -- `PrimeSpectrum.comap (RingHom.id R) p` equals `p`, it is also contained in the same -- neighborhood, hence `s` equals `a/b` there too. obtain ⟨W, hpW, iWU, h⟩ := s.2 (iVU p) obtain ⟨a, b, h'⟩ := h.eq_mk' obtain ⟨hb₁, s_eq₁⟩ := h' ⟨p, hpW⟩ obtain ⟨hb₂, s_eq₂⟩ := h' ⟨PrimeSpectrum.comap (RingHom.id _) p.1, hpW⟩ dsimp only at s_eq₁ s_eq₂ erw [s_eq₂, Localization.localRingHom_mk', ← s_eq₁, ← res_apply _ _ _ iVU] /-- The comap of the identity is the identity. In this variant of the lemma, two open subsets `U` and `V` are given as arguments, together with a proof that `U = V`. This is useful when `U` and `V` are not definitionally equal. -/ theorem comap_id {U V : Opens (PrimeSpectrum.Top R)} (hUV : U = V) : (comap (RingHom.id R) U V fun p hpV => by rwa [hUV, PrimeSpectrum.comap_id]) = (eqToHom (show (structureSheaf R).1.obj (op U) = _ by rw [hUV])).hom := by rw [comap_id_eq_map U V (eqToHom hUV.symm), eqToHom_op, eqToHom_map] @[simp] theorem comap_id' (U : Opens (PrimeSpectrum.Top R)) : (comap (RingHom.id R) U U fun p hpU => by rwa [PrimeSpectrum.comap_id]) = RingHom.id _ := by rw [comap_id rfl]; rfl theorem comap_comp (f : R →+* S) (g : S →+* P) (U : Opens (PrimeSpectrum.Top R)) (V : Opens (PrimeSpectrum.Top S)) (W : Opens (PrimeSpectrum.Top P)) (hUV : ∀ p ∈ V, PrimeSpectrum.comap f p ∈ U) (hVW : ∀ p ∈ W, PrimeSpectrum.comap g p ∈ V) : (comap (g.comp f) U W fun p hpW => hUV (PrimeSpectrum.comap g p) (hVW p hpW)) = (comap g V W hVW).comp (comap f U V hUV) := RingHom.ext fun s => Subtype.eq <\| funext fun p => by rw [comap_apply, Localization.localRingHom_comp _ (PrimeSpectrum.comap g p.1).asIdeal] <;> simp @[elementwise, reassoc] theorem toOpen_comp_comap (f : R →+* S) (U : Opens (PrimeSpectrum.Top R)) : (toOpen R U ≫ CommRingCat.ofHom (comap f U (Opens.comap (PrimeSpectrum.comap f) U) fun _ => id)) = CommRingCat.ofHom f ≫ toOpen S _ := CommRingCat.hom_ext <\| RingHom.ext fun _ => Subtype.eq <\| funext fun _ => Localization.localRingHom_to_map _ _ _ _ _ lemma comap_basicOpen (f : R →+* S) (x : R) : comap f (PrimeSpectrum.basicOpen x) (PrimeSpectrum.basicOpen (f x)) (PrimeSpectrum.comap_basicOpen f x).le = IsLocalization.map (M := .powers x) (T := .powers (f x)) _ f (Submonoid.powers_le.mpr (Submonoid.mem_powers _)) := IsLocalization.ringHom_ext (.powers x) <\| by simpa [CommRingCat.hom_ext_iff] using toOpen_comp_comap f _ end Comap end StructureSheaf end AlgebraicGeometry		Mathlib/AlgebraicGeometry/StructureSheaf.lean	1,196	1,198
/- 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.Analysis.Convex.Gauge import Mathlib.Analysis.Normed.Module.Convex /-! # "Gauge rescale" homeomorphism between convex sets Given two convex von Neumann bounded neighbourhoods of the origin in a real topological vector space, we construct a homeomorphism `gaugeRescaleHomeomorph` that sends the interior, the closure, and the frontier of one set to the interior, the closure, and the frontier of the other set. -/ open Metric Bornology Filter Set open scoped NNReal Topology Pointwise noncomputable section section Module variable {E : Type*} [AddCommGroup E] [Module ℝ E] /-- The gauge rescale map `gaugeRescale s t` sends each point `x` to the point `y` on the same ray that has the same gauge w.r.t. `t` as `x` has w.r.t. `s`. The characteristic property is satisfied if `gauge t x ≠ 0`, see `gauge_gaugeRescale'`. In particular, it is satisfied for all `x`, provided that `t` is absorbent and von Neumann bounded. -/ def gaugeRescale (s t : Set E) (x : E) : E := (gauge s x / gauge t x) • x theorem gaugeRescale_def (s t : Set E) (x : E) : gaugeRescale s t x = (gauge s x / gauge t x) • x := rfl @[simp] theorem gaugeRescale_zero (s t : Set E) : gaugeRescale s t 0 = 0 := smul_zero _ theorem gaugeRescale_smul (s t : Set E) {c : ℝ} (hc : 0 ≤ c) (x : E) : gaugeRescale s t (c • x) = c • gaugeRescale s t x := by simp only [gaugeRescale, gauge_smul_of_nonneg hc, smul_smul, smul_eq_mul] rw [mul_div_mul_comm, mul_right_comm, div_self_mul_self] theorem gauge_gaugeRescale' (s : Set E) {t : Set E} {x : E} (hx : gauge t x ≠ 0) : gauge t (gaugeRescale s t x) = gauge s x := by rw [gaugeRescale, gauge_smul_of_nonneg (div_nonneg (gauge_nonneg _) (gauge_nonneg _)), smul_eq_mul, div_mul_cancel₀ _ hx] theorem gauge_gaugeRescale_le (s t : Set E) (x : E) : gauge t (gaugeRescale s t x) ≤ gauge s x := by by_cases hx : gauge t x = 0 · simp [gaugeRescale, hx, gauge_nonneg] · exact (gauge_gaugeRescale' s hx).le variable [TopologicalSpace E] section variable [T1Space E] theorem gaugeRescale_self_apply {s : Set E} (hsa : Absorbent ℝ s) (hsb : IsVonNBounded ℝ s) (x : E) : gaugeRescale s s x = x := by rcases eq_or_ne x 0 with rfl \| hx; · simp rw [gaugeRescale, div_self, one_smul] exact ((gauge_pos hsa hsb).2 hx).ne' theorem gaugeRescale_self {s : Set E} (hsa : Absorbent ℝ s) (hsb : IsVonNBounded ℝ s) : gaugeRescale s s = id := funext <\| gaugeRescale_self_apply hsa hsb theorem gauge_gaugeRescale (s : Set E) {t : Set E} (hta : Absorbent ℝ t) (htb : IsVonNBounded ℝ t) (x : E) : gauge t (gaugeRescale s t x) = gauge s x := by rcases eq_or_ne x 0 with rfl \| hx	· simp · exact gauge_gaugeRescale' s ((gauge_pos hta htb).2 hx).ne' theorem gaugeRescale_gaugeRescale {s t u : Set E} (hta : Absorbent ℝ t) (htb : IsVonNBounded ℝ t) (x : E) : gaugeRescale t u (gaugeRescale s t x) = gaugeRescale s u x := by rcases eq_or_ne x 0 with rfl \| hx; · simp	Mathlib/Analysis/Convex/GaugeRescale.lean	75	80
/- Copyright (c) 2019 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Patrick Massot, Casper Putz, Anne Baanen -/ import Mathlib.Algebra.Algebra.Subalgebra.Tower import Mathlib.Data.Finite.Sum import Mathlib.Data.Matrix.Block import Mathlib.Data.Matrix.Notation import Mathlib.LinearAlgebra.Basis.Basic import Mathlib.LinearAlgebra.Basis.Fin import Mathlib.LinearAlgebra.Basis.Prod import Mathlib.LinearAlgebra.Basis.SMul import Mathlib.LinearAlgebra.Matrix.StdBasis import Mathlib.RingTheory.AlgebraTower import Mathlib.RingTheory.Ideal.Span /-! # Linear maps and matrices This file defines the maps to send matrices to a linear map, and to send linear maps between modules with a finite bases to matrices. This defines a linear equivalence between linear maps between finite-dimensional vector spaces and matrices indexed by the respective bases. ## Main definitions In the list below, and in all this file, `R` is a commutative ring (semiring is sometimes enough), `M` and its variations are `R`-modules, `ι`, `κ`, `n` and `m` are finite types used for indexing. * `LinearMap.toMatrix`: given bases `v₁ : ι → M₁` and `v₂ : κ → M₂`, the `R`-linear equivalence from `M₁ →ₗ[R] M₂` to `Matrix κ ι R` * `Matrix.toLin`: the inverse of `LinearMap.toMatrix` * `LinearMap.toMatrix'`: the `R`-linear equivalence from `(m → R) →ₗ[R] (n → R)` to `Matrix m n R` (with the standard basis on `m → R` and `n → R`) * `Matrix.toLin'`: the inverse of `LinearMap.toMatrix'` * `algEquivMatrix`: given a basis indexed by `n`, the `R`-algebra equivalence between `R`-endomorphisms of `M` and `Matrix n n R` ## Issues This file was originally written without attention to non-commutative rings, and so mostly only works in the commutative setting. This should be fixed. In particular, `Matrix.mulVec` gives us a linear equivalence `Matrix m n R ≃ₗ[R] (n → R) →ₗ[Rᵐᵒᵖ] (m → R)` while `Matrix.vecMul` gives us a linear equivalence `Matrix m n R ≃ₗ[Rᵐᵒᵖ] (m → R) →ₗ[R] (n → R)`. At present, the first equivalence is developed in detail but only for commutative rings (and we omit the distinction between `Rᵐᵒᵖ` and `R`), while the second equivalence is developed only in brief, but for not-necessarily-commutative rings. Naming is slightly inconsistent between the two developments. In the original (commutative) development `linear` is abbreviated to `lin`, although this is not consistent with the rest of mathlib. In the new (non-commutative) development `linear` is not abbreviated, and declarations use `_right` to indicate they use the right action of matrices on vectors (via `Matrix.vecMul`). When the two developments are made uniform, the names should be made uniform, too, by choosing between `linear` and `lin` consistently, and (presumably) adding `_left` where necessary. ## Tags linear_map, matrix, linear_equiv, diagonal, det, trace -/ noncomputable section open LinearMap Matrix Set Submodule section ToMatrixRight variable {R : Type} [Semiring R] variable {l m n : Type} /-- `Matrix.vecMul M` is a linear map. -/ def Matrix.vecMulLinear [Fintype m] (M : Matrix m n R) : (m → R) →ₗ[R] n → R where toFun x := x ᵥ* M map_add' _ _ := funext fun _ ↦ add_dotProduct _ _ _ map_smul' _ _ := funext fun _ ↦ smul_dotProduct _ _ _ @[simp] theorem Matrix.vecMulLinear_apply [Fintype m] (M : Matrix m n R) (x : m → R) : M.vecMulLinear x = x ᵥ* M := rfl theorem Matrix.coe_vecMulLinear [Fintype m] (M : Matrix m n R) : (M.vecMulLinear : _ → _) = M.vecMul := rfl variable [Fintype m] theorem range_vecMulLinear (M : Matrix m n R) : LinearMap.range M.vecMulLinear = span R (range M.row) := by letI := Classical.decEq m simp_rw [range_eq_map, ← iSup_range_single, Submodule.map_iSup, range_eq_map, ← Ideal.span_singleton_one, Ideal.span, Submodule.map_span, image_image, image_singleton, Matrix.vecMulLinear_apply, iSup_span, range_eq_iUnion, iUnion_singleton_eq_range, LinearMap.single, LinearMap.coe_mk, AddHom.coe_mk, row_def] unfold vecMul simp_rw [single_dotProduct, one_mul] theorem Matrix.vecMul_injective_iff {R : Type} [Ring R] {M : Matrix m n R} : Function.Injective M.vecMul ↔ LinearIndependent R M.row := by rw [← coe_vecMulLinear] simp only [← LinearMap.ker_eq_bot, Fintype.linearIndependent_iff, Submodule.eq_bot_iff, LinearMap.mem_ker, vecMulLinear_apply, row_def] refine ⟨fun h c h0 ↦ congr_fun <\| h c ?_, fun h c h0 ↦ funext <\| h c ?_⟩ · rw [← h0] ext i simp [vecMul, dotProduct] · rw [← h0] ext j simp [vecMul, dotProduct] lemma Matrix.linearIndependent_rows_of_isUnit {R : Type} [Ring R] {A : Matrix m m R} [DecidableEq m] (ha : IsUnit A) : LinearIndependent R A.row := by rw [← Matrix.vecMul_injective_iff] exact Matrix.vecMul_injective_of_isUnit ha section variable [DecidableEq m] /-- Linear maps `(m → R) →ₗ[R] (n → R)` are linearly equivalent over `Rᵐᵒᵖ` to `Matrix m n R`, by having matrices act by right multiplication. -/ def LinearMap.toMatrixRight' : ((m → R) →ₗ[R] n → R) ≃ₗ[Rᵐᵒᵖ] Matrix m n R where toFun f i j := f (single R (fun _ ↦ R) i 1) j invFun := Matrix.vecMulLinear right_inv M := by ext i j simp left_inv f := by apply (Pi.basisFun R m).ext intro j; ext i simp map_add' f g := by ext i j simp only [Pi.add_apply, LinearMap.add_apply, Matrix.add_apply] map_smul' c f := by ext i j simp only [Pi.smul_apply, LinearMap.smul_apply, RingHom.id_apply, Matrix.smul_apply] /-- A `Matrix m n R` is linearly equivalent over `Rᵐᵒᵖ` to a linear map `(m → R) →ₗ[R] (n → R)`, by having matrices act by right multiplication. -/ abbrev Matrix.toLinearMapRight' [DecidableEq m] : Matrix m n R ≃ₗ[Rᵐᵒᵖ] (m → R) →ₗ[R] n → R := LinearEquiv.symm LinearMap.toMatrixRight' @[simp] theorem Matrix.toLinearMapRight'_apply (M : Matrix m n R) (v : m → R) : (Matrix.toLinearMapRight') M v = v ᵥ* M := rfl @[simp] theorem Matrix.toLinearMapRight'_mul [Fintype l] [DecidableEq l] (M : Matrix l m R) (N : Matrix m n R) : Matrix.toLinearMapRight' (M * N) = (Matrix.toLinearMapRight' N).comp (Matrix.toLinearMapRight' M) := LinearMap.ext fun _x ↦ (vecMul_vecMul _ M N).symm theorem Matrix.toLinearMapRight'_mul_apply [Fintype l] [DecidableEq l] (M : Matrix l m R) (N : Matrix m n R) (x) : Matrix.toLinearMapRight' (M * N) x = Matrix.toLinearMapRight' N (Matrix.toLinearMapRight' M x) := (vecMul_vecMul _ M N).symm @[simp] theorem Matrix.toLinearMapRight'_one : Matrix.toLinearMapRight' (1 : Matrix m m R) = LinearMap.id := by ext simp [Module.End.one_apply] /-- If `M` and `M'` are each other's inverse matrices, they provide an equivalence between `n → A` and `m → A` corresponding to `M.vecMul` and `M'.vecMul`. -/ @[simps] def Matrix.toLinearEquivRight'OfInv [Fintype n] [DecidableEq n] {M : Matrix m n R} {M' : Matrix n m R} (hMM' : M * M' = 1) (hM'M : M' * M = 1) : (n → R) ≃ₗ[R] m → R := { LinearMap.toMatrixRight'.symm M' with toFun := Matrix.toLinearMapRight' M' invFun := Matrix.toLinearMapRight' M left_inv := fun x ↦ by rw [← Matrix.toLinearMapRight'_mul_apply, hM'M, Matrix.toLinearMapRight'_one, id_apply] right_inv := fun x ↦ by rw [← Matrix.toLinearMapRight'_mul_apply, hMM', Matrix.toLinearMapRight'_one, id_apply] } end end ToMatrixRight /-! From this point on, we only work with commutative rings, and fail to distinguish between `Rᵐᵒᵖ` and `R`. This should eventually be remedied. -/ section mulVec variable {R : Type} [CommSemiring R] variable {k l m n : Type} /-- `Matrix.mulVec M` is a linear map. -/ def Matrix.mulVecLin [Fintype n] (M : Matrix m n R) : (n → R) →ₗ[R] m → R where toFun := M.mulVec map_add' _ _ := funext fun _ ↦ dotProduct_add _ _ _ map_smul' _ _ := funext fun _ ↦ dotProduct_smul _ _ _ theorem Matrix.coe_mulVecLin [Fintype n] (M : Matrix m n R) : (M.mulVecLin : _ → _) = M.mulVec := rfl @[simp] theorem Matrix.mulVecLin_apply [Fintype n] (M : Matrix m n R) (v : n → R) : M.mulVecLin v = M ᵥ v := rfl @[simp] theorem Matrix.mulVecLin_zero [Fintype n] : Matrix.mulVecLin (0 : Matrix m n R) = 0 := LinearMap.ext zero_mulVec @[simp] theorem Matrix.mulVecLin_add [Fintype n] (M N : Matrix m n R) : (M + N).mulVecLin = M.mulVecLin + N.mulVecLin := LinearMap.ext fun _ ↦ add_mulVec _ _ _ @[simp] theorem Matrix.mulVecLin_transpose [Fintype m] (M : Matrix m n R) : Mᵀ.mulVecLin = M.vecMulLinear := by ext; simp [mulVec_transpose] @[simp] theorem Matrix.vecMulLinear_transpose [Fintype n] (M : Matrix m n R) : Mᵀ.vecMulLinear = M.mulVecLin := by ext; simp [vecMul_transpose] theorem Matrix.mulVecLin_submatrix [Fintype n] [Fintype l] (f₁ : m → k) (e₂ : n ≃ l) (M : Matrix k l R) : (M.submatrix f₁ e₂).mulVecLin = funLeft R R f₁ ∘ₗ M.mulVecLin ∘ₗ funLeft _ _ e₂.symm := LinearMap.ext fun _ ↦ submatrix_mulVec_equiv _ _ _ _ /-- A variant of `Matrix.mulVecLin_submatrix` that keeps around `LinearEquiv`s. -/ theorem Matrix.mulVecLin_reindex [Fintype n] [Fintype l] (e₁ : k ≃ m) (e₂ : l ≃ n) (M : Matrix k l R) : (reindex e₁ e₂ M).mulVecLin = ↑(LinearEquiv.funCongrLeft R R e₁.symm) ∘ₗ M.mulVecLin ∘ₗ ↑(LinearEquiv.funCongrLeft R R e₂) := Matrix.mulVecLin_submatrix _ _ _ variable [Fintype n] @[simp] theorem Matrix.mulVecLin_one [DecidableEq n] : Matrix.mulVecLin (1 : Matrix n n R) = LinearMap.id := by ext; simp [Matrix.one_apply, Pi.single_apply, eq_comm] @[simp] theorem Matrix.mulVecLin_mul [Fintype m] (M : Matrix l m R) (N : Matrix m n R) : Matrix.mulVecLin (M N) = (Matrix.mulVecLin M).comp (Matrix.mulVecLin N) := LinearMap.ext fun _ ↦ (mulVec_mulVec _ _ _).symm theorem Matrix.ker_mulVecLin_eq_bot_iff {M : Matrix m n R} : (LinearMap.ker M.mulVecLin) = ⊥ ↔ ∀ v, M ᵥ v = 0 → v = 0 := by simp only [Submodule.eq_bot_iff, LinearMap.mem_ker, Matrix.mulVecLin_apply] theorem Matrix.range_mulVecLin (M : Matrix m n R) : LinearMap.range M.mulVecLin = span R (range M.col) := by rw [← vecMulLinear_transpose, range_vecMulLinear, row_transpose] theorem Matrix.mulVec_injective_iff {R : Type} [CommRing R] {M : Matrix m n R} : Function.Injective M.mulVec ↔ LinearIndependent R M.col := by change Function.Injective (fun x ↦ _) ↔ _ simp_rw [← M.vecMul_transpose, vecMul_injective_iff, row_transpose] lemma Matrix.linearIndependent_cols_of_isUnit {R : Type} [CommRing R] [Fintype m] {A : Matrix m m R} [DecidableEq m] (ha : IsUnit A) : LinearIndependent R A.col := by rw [← Matrix.mulVec_injective_iff] exact Matrix.mulVec_injective_of_isUnit ha end mulVec section ToMatrix' variable {R : Type} [CommSemiring R] variable {k l m n : Type*} [DecidableEq n] [Fintype n] /-- Linear maps `(n → R) →ₗ[R] (m → R)` are linearly equivalent to `Matrix m n R`. -/ def LinearMap.toMatrix' : ((n → R) →ₗ[R] m → R) ≃ₗ[R] Matrix m n R where toFun f := of fun i j ↦ f (Pi.single j 1) i invFun := Matrix.mulVecLin right_inv M := by ext i j simp only [Matrix.mulVec_single_one, Matrix.mulVecLin_apply, of_apply, transpose_apply] left_inv f := by apply (Pi.basisFun R n).ext intro j; ext i simp only [Pi.basisFun_apply, Matrix.mulVec_single_one, Matrix.mulVecLin_apply, of_apply, transpose_apply]	map_add' f g := by ext i j simp only [Pi.add_apply, LinearMap.add_apply, of_apply, Matrix.add_apply] map_smul' c f := by	Mathlib/LinearAlgebra/Matrix/ToLin.lean	293	296
/- Copyright (c) 2020 Simon Hudon. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Simon Hudon -/ import Mathlib.Data.Stream.Init import Mathlib.Tactic.ApplyFun import Mathlib.Control.Fix import Mathlib.Order.OmegaCompletePartialOrder /-! # Lawful fixed point operators This module defines the laws required of a `Fix` instance, using the theory of omega complete partial orders (ωCPO). Proofs of the lawfulness of all `Fix` instances in `Control.Fix` are provided. ## Main definition * class `LawfulFix` -/ universe u v variable {α : Type} {β : α → Type} open OmegaCompletePartialOrder /-- Intuitively, a fixed point operator `fix` is lawful if it satisfies `fix f = f (fix f)` for all `f`, but this is inconsistent / uninteresting in most cases due to the existence of "exotic" functions `f`, such as the function that is defined iff its argument is not, familiar from the halting problem. Instead, this requirement is limited to only functions that are `Continuous` in the sense of `ω`-complete partial orders, which excludes the example because it is not monotone (making the input argument less defined can make `f` more defined). -/ class LawfulFix (α : Type) [OmegaCompletePartialOrder α] extends Fix α where fix_eq : ∀ {f : α → α}, ωScottContinuous f → Fix.fix f = f (Fix.fix f) namespace Part open Part Nat Nat.Upto namespace Fix variable (f : ((a : _) → Part <\| β a) →o (a : _) → Part <\| β a) theorem approx_mono' {i : ℕ} : Fix.approx f i ≤ Fix.approx f (succ i) := by induction i with \| zero => dsimp [approx]; apply @bot_le _ _ _ (f ⊥) \| succ _ i_ih => intro; apply f.monotone; apply i_ih theorem approx_mono ⦃i j : ℕ⦄ (hij : i ≤ j) : approx f i ≤ approx f j := by induction' j with j ih · cases hij exact le_rfl cases hij; · exact le_rfl exact le_trans (ih ‹_›) (approx_mono' f) theorem mem_iff (a : α) (b : β a) : b ∈ Part.fix f a ↔ ∃ i, b ∈ approx f i a := by classical by_cases h₀ : ∃ i : ℕ, (approx f i a).Dom · simp only [Part.fix_def f h₀] constructor <;> intro hh · exact ⟨_, hh⟩ have h₁ := Nat.find_spec h₀ rw [dom_iff_mem] at h₁ obtain ⟨y, h₁⟩ := h₁ replace h₁ := approx_mono' f _ _ h₁ suffices y = b by subst this exact h₁ obtain ⟨i, hh⟩ := hh revert h₁; generalize succ (Nat.find h₀) = j; intro h₁ wlog case : i ≤ j · rcases le_total i j with H \| H <;> [skip; symm] <;> apply_assumption <;> assumption replace hh := approx_mono f case _ _ hh apply Part.mem_unique h₁ hh · simp only [fix_def' (⇑f) h₀, not_exists, false_iff, not_mem_none] simp only [dom_iff_mem, not_exists] at h₀ intro; apply h₀ theorem approx_le_fix (i : ℕ) : approx f i ≤ Part.fix f := fun a b hh ↦ by rw [mem_iff f] exact ⟨_, hh⟩ theorem exists_fix_le_approx (x : α) : ∃ i, Part.fix f x ≤ approx f i x := by by_cases hh : ∃ i b, b ∈ approx f i x · rcases hh with ⟨i, b, hb⟩ exists i intro b' h' have hb' := approx_le_fix f i _ _ hb obtain rfl := Part.mem_unique h' hb' exact hb · simp only [not_exists] at hh exists 0 intro b' h' simp only [mem_iff f] at h' obtain ⟨i, h'⟩ := h' cases hh _ _ h' /-- The series of approximations of `fix f` (see `approx`) as a `Chain` -/ def approxChain : Chain ((a : _) → Part <\| β a) := ⟨approx f, approx_mono f⟩ theorem le_f_of_mem_approx {x} : x ∈ approxChain f → x ≤ f x := by simp only [Membership.mem, forall_exists_index] rintro i rfl apply approx_mono' theorem approx_mem_approxChain {i} : approx f i ∈ approxChain f := Stream'.mem_of_get_eq rfl end Fix open Fix variable {α : Type} variable (f : ((a : _) → Part <\| β a) →o (a : _) → Part <\| β a) open OmegaCompletePartialOrder	open Part hiding ωSup open Nat	Mathlib/Control/LawfulFix.lean	120	123
/- Copyright (c) 2018 Ellen Arlt. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Ellen Arlt, Blair Shi, Sean Leather, Mario Carneiro, Johan Commelin -/ import Mathlib.Data.Matrix.Basic import Mathlib.Data.Matrix.Composition import Mathlib.Data.Matrix.ConjTranspose /-! # Block Matrices ## Main definitions * `Matrix.fromBlocks`: build a block matrix out of 4 blocks * `Matrix.toBlocks₁₁`, `Matrix.toBlocks₁₂`, `Matrix.toBlocks₂₁`, `Matrix.toBlocks₂₂`: extract each of the four blocks from `Matrix.fromBlocks`. * `Matrix.blockDiagonal`: block diagonal of equally sized blocks. On square blocks, this is a ring homomorphisms, `Matrix.blockDiagonalRingHom`. * `Matrix.blockDiag`: extract the blocks from the diagonal of a block diagonal matrix. * `Matrix.blockDiagonal'`: block diagonal of unequally sized blocks. On square blocks, this is a ring homomorphisms, `Matrix.blockDiagonal'RingHom`. * `Matrix.blockDiag'`: extract the blocks from the diagonal of a block diagonal matrix. -/ variable {l m n o p q : Type} {m' n' p' : o → Type} variable {R : Type} {S : Type} {α : Type} {β : Type} open Matrix namespace Matrix theorem dotProduct_block [Fintype m] [Fintype n] [Mul α] [AddCommMonoid α] (v w : m ⊕ n → α) : v ⬝ᵥ w = v ∘ Sum.inl ⬝ᵥ w ∘ Sum.inl + v ∘ Sum.inr ⬝ᵥ w ∘ Sum.inr := Fintype.sum_sum_type _ section BlockMatrices /-- We can form a single large matrix by flattening smaller 'block' matrices of compatible dimensions. -/ @[pp_nodot] def fromBlocks (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : Matrix (n ⊕ o) (l ⊕ m) α := of <\| Sum.elim (fun i => Sum.elim (A i) (B i)) (fun j => Sum.elim (C j) (D j)) @[simp] theorem fromBlocks_apply₁₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (i : n) (j : l) : fromBlocks A B C D (Sum.inl i) (Sum.inl j) = A i j := rfl @[simp] theorem fromBlocks_apply₁₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (i : n) (j : m) : fromBlocks A B C D (Sum.inl i) (Sum.inr j) = B i j := rfl @[simp] theorem fromBlocks_apply₂₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (i : o) (j : l) : fromBlocks A B C D (Sum.inr i) (Sum.inl j) = C i j := rfl @[simp] theorem fromBlocks_apply₂₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (i : o) (j : m) : fromBlocks A B C D (Sum.inr i) (Sum.inr j) = D i j := rfl /-- Given a matrix whose row and column indexes are sum types, we can extract the corresponding "top left" submatrix. -/ def toBlocks₁₁ (M : Matrix (n ⊕ o) (l ⊕ m) α) : Matrix n l α := of fun i j => M (Sum.inl i) (Sum.inl j) /-- Given a matrix whose row and column indexes are sum types, we can extract the corresponding "top right" submatrix. -/ def toBlocks₁₂ (M : Matrix (n ⊕ o) (l ⊕ m) α) : Matrix n m α := of fun i j => M (Sum.inl i) (Sum.inr j) /-- Given a matrix whose row and column indexes are sum types, we can extract the corresponding "bottom left" submatrix. -/ def toBlocks₂₁ (M : Matrix (n ⊕ o) (l ⊕ m) α) : Matrix o l α := of fun i j => M (Sum.inr i) (Sum.inl j) /-- Given a matrix whose row and column indexes are sum types, we can extract the corresponding "bottom right" submatrix. -/ def toBlocks₂₂ (M : Matrix (n ⊕ o) (l ⊕ m) α) : Matrix o m α := of fun i j => M (Sum.inr i) (Sum.inr j) theorem fromBlocks_toBlocks (M : Matrix (n ⊕ o) (l ⊕ m) α) : fromBlocks M.toBlocks₁₁ M.toBlocks₁₂ M.toBlocks₂₁ M.toBlocks₂₂ = M := by ext i j rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> rfl @[simp] theorem toBlocks_fromBlocks₁₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D).toBlocks₁₁ = A := rfl @[simp] theorem toBlocks_fromBlocks₁₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D).toBlocks₁₂ = B := rfl @[simp] theorem toBlocks_fromBlocks₂₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D).toBlocks₂₁ = C := rfl @[simp] theorem toBlocks_fromBlocks₂₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D).toBlocks₂₂ = D := rfl /-- Two block matrices are equal if their blocks are equal. -/ theorem ext_iff_blocks {A B : Matrix (n ⊕ o) (l ⊕ m) α} : A = B ↔ A.toBlocks₁₁ = B.toBlocks₁₁ ∧ A.toBlocks₁₂ = B.toBlocks₁₂ ∧ A.toBlocks₂₁ = B.toBlocks₂₁ ∧ A.toBlocks₂₂ = B.toBlocks₂₂ := ⟨fun h => h ▸ ⟨rfl, rfl, rfl, rfl⟩, fun ⟨h₁₁, h₁₂, h₂₁, h₂₂⟩ => by rw [← fromBlocks_toBlocks A, ← fromBlocks_toBlocks B, h₁₁, h₁₂, h₂₁, h₂₂]⟩ @[simp] theorem fromBlocks_inj {A : Matrix n l α} {B : Matrix n m α} {C : Matrix o l α} {D : Matrix o m α} {A' : Matrix n l α} {B' : Matrix n m α} {C' : Matrix o l α} {D' : Matrix o m α} : fromBlocks A B C D = fromBlocks A' B' C' D' ↔ A = A' ∧ B = B' ∧ C = C' ∧ D = D' := ext_iff_blocks theorem fromBlocks_map (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (f : α → β) : (fromBlocks A B C D).map f = fromBlocks (A.map f) (B.map f) (C.map f) (D.map f) := by ext i j; rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [fromBlocks] theorem fromBlocks_transpose (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D)ᵀ = fromBlocks Aᵀ Cᵀ Bᵀ Dᵀ := by ext i j rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [fromBlocks] theorem fromBlocks_conjTranspose [Star α] (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D)ᴴ = fromBlocks Aᴴ Cᴴ Bᴴ Dᴴ := by simp only [conjTranspose, fromBlocks_transpose, fromBlocks_map] @[simp] theorem fromBlocks_submatrix_sum_swap_left (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (f : p → l ⊕ m) : (fromBlocks A B C D).submatrix Sum.swap f = (fromBlocks C D A B).submatrix id f := by ext i j cases i <;> dsimp <;> cases f j <;> rfl @[simp] theorem fromBlocks_submatrix_sum_swap_right (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (f : p → n ⊕ o) : (fromBlocks A B C D).submatrix f Sum.swap = (fromBlocks B A D C).submatrix f id := by ext i j cases j <;> dsimp <;> cases f i <;> rfl theorem fromBlocks_submatrix_sum_swap_sum_swap {l m n o α : Type} (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D).submatrix Sum.swap Sum.swap = fromBlocks D C B A := by simp /-- A 2x2 block matrix is block diagonal if the blocks outside of the diagonal vanish -/ def IsTwoBlockDiagonal [Zero α] (A : Matrix (n ⊕ o) (l ⊕ m) α) : Prop := toBlocks₁₂ A = 0 ∧ toBlocks₂₁ A = 0 /-- Let `p` pick out certain rows and `q` pick out certain columns of a matrix `M`. Then `toBlock M p q` is the corresponding block matrix. -/ def toBlock (M : Matrix m n α) (p : m → Prop) (q : n → Prop) : Matrix { a // p a } { a // q a } α := M.submatrix (↑) (↑) @[simp] theorem toBlock_apply (M : Matrix m n α) (p : m → Prop) (q : n → Prop) (i : { a // p a }) (j : { a // q a }) : toBlock M p q i j = M ↑i ↑j := rfl /-- Let `p` pick out certain rows and columns of a square matrix `M`. Then `toSquareBlockProp M p` is the corresponding block matrix. -/ def toSquareBlockProp (M : Matrix m m α) (p : m → Prop) : Matrix { a // p a } { a // p a } α := toBlock M _ _ theorem toSquareBlockProp_def (M : Matrix m m α) (p : m → Prop) : toSquareBlockProp M p = of (fun i j : { a // p a } => M ↑i ↑j) := rfl /-- Let `b` map rows and columns of a square matrix `M` to blocks. Then `toSquareBlock M b k` is the block `k` matrix. -/ def toSquareBlock (M : Matrix m m α) (b : m → β) (k : β) : Matrix { a // b a = k } { a // b a = k } α := toSquareBlockProp M _ theorem toSquareBlock_def (M : Matrix m m α) (b : m → β) (k : β) : toSquareBlock M b k = of (fun i j : { a // b a = k } => M ↑i ↑j) := rfl theorem fromBlocks_smul [SMul R α] (x : R) (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : x • fromBlocks A B C D = fromBlocks (x • A) (x • B) (x • C) (x • D) := by ext i j; rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [fromBlocks] theorem fromBlocks_neg [Neg R] (A : Matrix n l R) (B : Matrix n m R) (C : Matrix o l R) (D : Matrix o m R) : -fromBlocks A B C D = fromBlocks (-A) (-B) (-C) (-D) := by ext i j cases i <;> cases j <;> simp [fromBlocks] @[simp] theorem fromBlocks_zero [Zero α] : fromBlocks (0 : Matrix n l α) 0 0 (0 : Matrix o m α) = 0 := by ext i j rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> rfl theorem fromBlocks_add [Add α] (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (A' : Matrix n l α) (B' : Matrix n m α) (C' : Matrix o l α) (D' : Matrix o m α) : fromBlocks A B C D + fromBlocks A' B' C' D' = fromBlocks (A + A') (B + B') (C + C') (D + D') := by ext i j; rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> rfl theorem fromBlocks_multiply [Fintype l] [Fintype m] [NonUnitalNonAssocSemiring α] (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (A' : Matrix l p α) (B' : Matrix l q α) (C' : Matrix m p α) (D' : Matrix m q α) : fromBlocks A B C D fromBlocks A' B' C' D' = fromBlocks (A * A' + B * C') (A * B' + B * D') (C * A' + D * C') (C * B' + D * D') := by ext i j rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp only [fromBlocks, mul_apply, of_apply, Sum.elim_inr, Fintype.sum_sum_type, Sum.elim_inl, add_apply] theorem fromBlocks_mulVec [Fintype l] [Fintype m] [NonUnitalNonAssocSemiring α] (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (x : l ⊕ m → α) : (fromBlocks A B C D) ᵥ x = Sum.elim (A ᵥ (x ∘ Sum.inl) + B ᵥ (x ∘ Sum.inr)) (C ᵥ (x ∘ Sum.inl) + D ᵥ (x ∘ Sum.inr)) := by ext i cases i <;> simp [mulVec, dotProduct] theorem vecMul_fromBlocks [Fintype n] [Fintype o] [NonUnitalNonAssocSemiring α] (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (x : n ⊕ o → α) : x ᵥ fromBlocks A B C D = Sum.elim ((x ∘ Sum.inl) ᵥ* A + (x ∘ Sum.inr) ᵥ* C) ((x ∘ Sum.inl) ᵥ* B + (x ∘ Sum.inr) ᵥ* D) := by ext i cases i <;> simp [vecMul, dotProduct] variable [DecidableEq l] [DecidableEq m] section Zero variable [Zero α] theorem toBlock_diagonal_self (d : m → α) (p : m → Prop) : Matrix.toBlock (diagonal d) p p = diagonal fun i : Subtype p => d ↑i := by ext i j by_cases h : i = j · simp [h] · simp [One.one, h, Subtype.val_injective.ne h] theorem toBlock_diagonal_disjoint (d : m → α) {p q : m → Prop} (hpq : Disjoint p q) : Matrix.toBlock (diagonal d) p q = 0 := by ext ⟨i, hi⟩ ⟨j, hj⟩ have : i ≠ j := fun heq => hpq.le_bot i ⟨hi, heq.symm ▸ hj⟩ simp [diagonal_apply_ne d this] @[simp] theorem fromBlocks_diagonal (d₁ : l → α) (d₂ : m → α) : fromBlocks (diagonal d₁) 0 0 (diagonal d₂) = diagonal (Sum.elim d₁ d₂) := by ext i j rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [diagonal] @[simp] lemma toBlocks₁₁_diagonal (v : l ⊕ m → α) : toBlocks₁₁ (diagonal v) = diagonal (fun i => v (Sum.inl i)) := by unfold toBlocks₁₁ funext i j simp only [ne_eq, Sum.inl.injEq, of_apply, diagonal_apply] @[simp] lemma toBlocks₂₂_diagonal (v : l ⊕ m → α) : toBlocks₂₂ (diagonal v) = diagonal (fun i => v (Sum.inr i)) := by unfold toBlocks₂₂ funext i j simp only [ne_eq, Sum.inr.injEq, of_apply, diagonal_apply] @[simp] lemma toBlocks₁₂_diagonal (v : l ⊕ m → α) : toBlocks₁₂ (diagonal v) = 0 := rfl @[simp] lemma toBlocks₂₁_diagonal (v : l ⊕ m → α) : toBlocks₂₁ (diagonal v) = 0 := rfl end Zero section HasZeroHasOne variable [Zero α] [One α] @[simp] theorem fromBlocks_one : fromBlocks (1 : Matrix l l α) 0 0 (1 : Matrix m m α) = 1 := by ext i j rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [one_apply] @[simp] theorem toBlock_one_self (p : m → Prop) : Matrix.toBlock (1 : Matrix m m α) p p = 1 := toBlock_diagonal_self _ p theorem toBlock_one_disjoint {p q : m → Prop} (hpq : Disjoint p q) : Matrix.toBlock (1 : Matrix m m α) p q = 0 := toBlock_diagonal_disjoint _ hpq end HasZeroHasOne end BlockMatrices section BlockDiagonal variable [DecidableEq o] section Zero variable [Zero α] [Zero β] /-- `Matrix.blockDiagonal M` turns a homogeneously-indexed collection of matrices `M : o → Matrix m n α'` into an `m × o`-by-`n × o` block matrix which has the entries of `M` along the diagonal and zero elsewhere. See also `Matrix.blockDiagonal'` if the matrices may not have the same size everywhere. -/ def blockDiagonal (M : o → Matrix m n α) : Matrix (m × o) (n × o) α := of <\| (fun ⟨i, k⟩ ⟨j, k'⟩ => if k = k' then M k i j else 0 : m × o → n × o → α) -- TODO: set as an equation lemma for `blockDiagonal`, see https://github.com/leanprover-community/mathlib4/pull/3024 theorem blockDiagonal_apply' (M : o → Matrix m n α) (i k j k') : blockDiagonal M ⟨i, k⟩ ⟨j, k'⟩ = if k = k' then M k i j else 0 := rfl theorem blockDiagonal_apply (M : o → Matrix m n α) (ik jk) : blockDiagonal M ik jk = if ik.2 = jk.2 then M ik.2 ik.1 jk.1 else 0 := by cases ik cases jk rfl @[simp] theorem blockDiagonal_apply_eq (M : o → Matrix m n α) (i j k) : blockDiagonal M (i, k) (j, k) = M k i j := if_pos rfl theorem blockDiagonal_apply_ne (M : o → Matrix m n α) (i j) {k k'} (h : k ≠ k') : blockDiagonal M (i, k) (j, k') = 0 := if_neg h theorem blockDiagonal_map (M : o → Matrix m n α) (f : α → β) (hf : f 0 = 0) : (blockDiagonal M).map f = blockDiagonal fun k => (M k).map f := by ext simp only [map_apply, blockDiagonal_apply, eq_comm] rw [apply_ite f, hf] @[simp] theorem blockDiagonal_transpose (M : o → Matrix m n α) : (blockDiagonal M)ᵀ = blockDiagonal fun k => (M k)ᵀ := by ext simp only [transpose_apply, blockDiagonal_apply, eq_comm] split_ifs with h · rw [h] · rfl @[simp] theorem blockDiagonal_conjTranspose {α : Type} [AddMonoid α] [StarAddMonoid α] (M : o → Matrix m n α) : (blockDiagonal M)ᴴ = blockDiagonal fun k => (M k)ᴴ := by simp only [conjTranspose, blockDiagonal_transpose] rw [blockDiagonal_map _ star (star_zero α)] @[simp] theorem blockDiagonal_zero : blockDiagonal (0 : o → Matrix m n α) = 0 := by ext simp [blockDiagonal_apply] @[simp] theorem blockDiagonal_diagonal [DecidableEq m] (d : o → m → α) : (blockDiagonal fun k => diagonal (d k)) = diagonal fun ik => d ik.2 ik.1 := by ext ⟨i, k⟩ ⟨j, k'⟩ simp only [blockDiagonal_apply, diagonal_apply, Prod.mk_inj, ← ite_and] congr 1 rw [and_comm] @[simp] theorem blockDiagonal_one [DecidableEq m] [One α] : blockDiagonal (1 : o → Matrix m m α) = 1 := show (blockDiagonal fun _ : o => diagonal fun _ : m => (1 : α)) = diagonal fun _ => 1 by rw [blockDiagonal_diagonal] end Zero @[simp] theorem blockDiagonal_add [AddZeroClass α] (M N : o → Matrix m n α) : blockDiagonal (M + N) = blockDiagonal M + blockDiagonal N := by ext simp only [blockDiagonal_apply, Pi.add_apply, add_apply] split_ifs <;> simp section variable (o m n α) /-- `Matrix.blockDiagonal` as an `AddMonoidHom`. -/ @[simps] def blockDiagonalAddMonoidHom [AddZeroClass α] : (o → Matrix m n α) →+ Matrix (m × o) (n × o) α where toFun := blockDiagonal map_zero' := blockDiagonal_zero map_add' := blockDiagonal_add end @[simp] theorem blockDiagonal_neg [AddGroup α] (M : o → Matrix m n α) : blockDiagonal (-M) = -blockDiagonal M := map_neg (blockDiagonalAddMonoidHom m n o α) M @[simp] theorem blockDiagonal_sub [AddGroup α] (M N : o → Matrix m n α) : blockDiagonal (M - N) = blockDiagonal M - blockDiagonal N := map_sub (blockDiagonalAddMonoidHom m n o α) M N @[simp] theorem blockDiagonal_mul [Fintype n] [Fintype o] [NonUnitalNonAssocSemiring α] (M : o → Matrix m n α) (N : o → Matrix n p α) : (blockDiagonal fun k => M k N k) = blockDiagonal M * blockDiagonal N := by ext ⟨i, k⟩ ⟨j, k'⟩ simp only [blockDiagonal_apply, mul_apply, ← Finset.univ_product_univ, Finset.sum_product] split_ifs with h <;> simp [h] section variable (α m o) /-- `Matrix.blockDiagonal` as a `RingHom`. -/ @[simps] def blockDiagonalRingHom [DecidableEq m] [Fintype o] [Fintype m] [NonAssocSemiring α] : (o → Matrix m m α) →+* Matrix (m × o) (m × o) α := { blockDiagonalAddMonoidHom m m o α with toFun := blockDiagonal map_one' := blockDiagonal_one map_mul' := blockDiagonal_mul } end @[simp] theorem blockDiagonal_pow [DecidableEq m] [Fintype o] [Fintype m] [Semiring α] (M : o → Matrix m m α) (n : ℕ) : blockDiagonal (M ^ n) = blockDiagonal M ^ n := map_pow (blockDiagonalRingHom m o α) M n @[simp] theorem blockDiagonal_smul {R : Type} [Zero α] [SMulZeroClass R α] (x : R) (M : o → Matrix m n α) : blockDiagonal (x • M) = x • blockDiagonal M := by ext simp only [blockDiagonal_apply, Pi.smul_apply, smul_apply] split_ifs <;> simp end BlockDiagonal section BlockDiag /-- Extract a block from the diagonal of a block diagonal matrix. This is the block form of `Matrix.diag`, and the left-inverse of `Matrix.blockDiagonal`. -/ def blockDiag (M : Matrix (m × o) (n × o) α) (k : o) : Matrix m n α := of fun i j => M (i, k) (j, k) -- TODO: set as an equation lemma for `blockDiag`, see https://github.com/leanprover-community/mathlib4/pull/3024 theorem blockDiag_apply (M : Matrix (m × o) (n × o) α) (k : o) (i j) : blockDiag M k i j = M (i, k) (j, k) := rfl theorem blockDiag_map (M : Matrix (m × o) (n × o) α) (f : α → β) : blockDiag (M.map f) = fun k => (blockDiag M k).map f := rfl @[simp] theorem blockDiag_transpose (M : Matrix (m × o) (n × o) α) (k : o) : blockDiag Mᵀ k = (blockDiag M k)ᵀ := ext fun _ _ => rfl @[simp] theorem blockDiag_conjTranspose {α : Type} [Star α] (M : Matrix (m × o) (n × o) α) (k : o) : blockDiag Mᴴ k = (blockDiag M k)ᴴ := ext fun _ _ => rfl section Zero variable [Zero α] [Zero β] @[simp] theorem blockDiag_zero : blockDiag (0 : Matrix (m × o) (n × o) α) = 0 := rfl @[simp] theorem blockDiag_diagonal [DecidableEq o] [DecidableEq m] (d : m × o → α) (k : o) : blockDiag (diagonal d) k = diagonal fun i => d (i, k) := ext fun i j => by obtain rfl \| hij := Decidable.eq_or_ne i j · rw [blockDiag_apply, diagonal_apply_eq, diagonal_apply_eq] · rw [blockDiag_apply, diagonal_apply_ne _ hij, diagonal_apply_ne _ (mt _ hij)] exact Prod.fst_eq_iff.mpr @[simp] theorem blockDiag_blockDiagonal [DecidableEq o] (M : o → Matrix m n α) : blockDiag (blockDiagonal M) = M := funext fun _ => ext fun i j => blockDiagonal_apply_eq M i j _ theorem blockDiagonal_injective [DecidableEq o] : Function.Injective (blockDiagonal : (o → Matrix m n α) → Matrix _ _ α) := Function.LeftInverse.injective blockDiag_blockDiagonal @[simp] theorem blockDiagonal_inj [DecidableEq o] {M N : o → Matrix m n α} : blockDiagonal M = blockDiagonal N ↔ M = N := blockDiagonal_injective.eq_iff @[simp] theorem blockDiag_one [DecidableEq o] [DecidableEq m] [One α] : blockDiag (1 : Matrix (m × o) (m × o) α) = 1 := funext <\| blockDiag_diagonal _ end Zero @[simp] theorem blockDiag_add [Add α] (M N : Matrix (m × o) (n × o) α) : blockDiag (M + N) = blockDiag M + blockDiag N := rfl section variable (o m n α) /-- `Matrix.blockDiag` as an `AddMonoidHom`. -/ @[simps] def blockDiagAddMonoidHom [AddZeroClass α] : Matrix (m × o) (n × o) α →+ o → Matrix m n α where toFun := blockDiag map_zero' := blockDiag_zero map_add' := blockDiag_add end @[simp] theorem blockDiag_neg [AddGroup α] (M : Matrix (m × o) (n × o) α) : blockDiag (-M) = -blockDiag M := map_neg (blockDiagAddMonoidHom m n o α) M @[simp] theorem blockDiag_sub [AddGroup α] (M N : Matrix (m × o) (n × o) α) : blockDiag (M - N) = blockDiag M - blockDiag N := map_sub (blockDiagAddMonoidHom m n o α) M N @[simp] theorem blockDiag_smul {R : Type} [SMul R α] (x : R) (M : Matrix (m × o) (n × o) α) : blockDiag (x • M) = x • blockDiag M := rfl end BlockDiag section BlockDiagonal' variable [DecidableEq o] section Zero variable [Zero α] [Zero β] /-- `Matrix.blockDiagonal' M` turns `M : Π i, Matrix (m i) (n i) α` into a `Σ i, m i`-by-`Σ i, n i` block matrix which has the entries of `M` along the diagonal and zero elsewhere. This is the dependently-typed version of `Matrix.blockDiagonal`. -/ def blockDiagonal' (M : ∀ i, Matrix (m' i) (n' i) α) : Matrix (Σ i, m' i) (Σ i, n' i) α := of <\| (fun ⟨k, i⟩ ⟨k', j⟩ => if h : k = k' then M k i (cast (congr_arg n' h.symm) j) else 0 : (Σ i, m' i) → (Σ i, n' i) → α) -- TODO: set as an equation lemma for `blockDiagonal'`, see https://github.com/leanprover-community/mathlib4/pull/3024 theorem blockDiagonal'_apply' (M : ∀ i, Matrix (m' i) (n' i) α) (k i k' j) : blockDiagonal' M ⟨k, i⟩ ⟨k', j⟩ = if h : k = k' then M k i (cast (congr_arg n' h.symm) j) else 0 := rfl theorem blockDiagonal'_eq_blockDiagonal (M : o → Matrix m n α) {k k'} (i j) : blockDiagonal M (i, k) (j, k') = blockDiagonal' M ⟨k, i⟩ ⟨k', j⟩ := rfl theorem blockDiagonal'_submatrix_eq_blockDiagonal (M : o → Matrix m n α) : (blockDiagonal' M).submatrix (Prod.toSigma ∘ Prod.swap) (Prod.toSigma ∘ Prod.swap) = blockDiagonal M := Matrix.ext fun ⟨_, _⟩ ⟨_, _⟩ => rfl theorem blockDiagonal'_apply (M : ∀ i, Matrix (m' i) (n' i) α) (ik jk) : blockDiagonal' M ik jk = if h : ik.1 = jk.1 then M ik.1 ik.2 (cast (congr_arg n' h.symm) jk.2) else 0 := by cases ik cases jk rfl @[simp] theorem blockDiagonal'_apply_eq (M : ∀ i, Matrix (m' i) (n' i) α) (k i j) : blockDiagonal' M ⟨k, i⟩ ⟨k, j⟩ = M k i j := dif_pos rfl theorem blockDiagonal'_apply_ne (M : ∀ i, Matrix (m' i) (n' i) α) {k k'} (i j) (h : k ≠ k') : blockDiagonal' M ⟨k, i⟩ ⟨k', j⟩ = 0 := dif_neg h theorem blockDiagonal'_map (M : ∀ i, Matrix (m' i) (n' i) α) (f : α → β) (hf : f 0 = 0) : (blockDiagonal' M).map f = blockDiagonal' fun k => (M k).map f := by ext simp only [map_apply, blockDiagonal'_apply, eq_comm] rw [apply_dite f, hf] @[simp] theorem blockDiagonal'_transpose (M : ∀ i, Matrix (m' i) (n' i) α) : (blockDiagonal' M)ᵀ = blockDiagonal' fun k => (M k)ᵀ := by ext ⟨ii, ix⟩ ⟨ji, jx⟩ simp only [transpose_apply, blockDiagonal'_apply] split_ifs <;> cc @[simp] theorem blockDiagonal'_conjTranspose {α} [AddMonoid α] [StarAddMonoid α] (M : ∀ i, Matrix (m' i) (n' i) α) : (blockDiagonal' M)ᴴ = blockDiagonal' fun k => (M k)ᴴ := by simp only [conjTranspose, blockDiagonal'_transpose] exact blockDiagonal'_map _ star (star_zero α) @[simp] theorem blockDiagonal'_zero : blockDiagonal' (0 : ∀ i, Matrix (m' i) (n' i) α) = 0 := by ext simp [blockDiagonal'_apply] @[simp] theorem blockDiagonal'_diagonal [∀ i, DecidableEq (m' i)] (d : ∀ i, m' i → α) : (blockDiagonal' fun k => diagonal (d k)) = diagonal fun ik => d ik.1 ik.2 := by ext ⟨i, k⟩ ⟨j, k'⟩ simp only [blockDiagonal'_apply, diagonal] obtain rfl \| hij := Decidable.eq_or_ne i j · simp · simp [hij] @[simp] theorem blockDiagonal'_one [∀ i, DecidableEq (m' i)] [One α] : blockDiagonal' (1 : ∀ i, Matrix (m' i) (m' i) α) = 1 := show (blockDiagonal' fun i : o => diagonal fun _ : m' i => (1 : α)) = diagonal fun _ => 1 by rw [blockDiagonal'_diagonal] end Zero @[simp] theorem blockDiagonal'_add [AddZeroClass α] (M N : ∀ i, Matrix (m' i) (n' i) α) : blockDiagonal' (M + N) = blockDiagonal' M + blockDiagonal' N := by ext simp only [blockDiagonal'_apply, Pi.add_apply, add_apply] split_ifs <;> simp section variable (m' n' α) /-- `Matrix.blockDiagonal'` as an `AddMonoidHom`. -/ @[simps] def blockDiagonal'AddMonoidHom [AddZeroClass α] : (∀ i, Matrix (m' i) (n' i) α) →+ Matrix (Σ i, m' i) (Σ i, n' i) α where toFun := blockDiagonal' map_zero' := blockDiagonal'_zero map_add' := blockDiagonal'_add end @[simp] theorem blockDiagonal'_neg [AddGroup α] (M : ∀ i, Matrix (m' i) (n' i) α) : blockDiagonal' (-M) = -blockDiagonal' M := map_neg (blockDiagonal'AddMonoidHom m' n' α) M @[simp] theorem blockDiagonal'_sub [AddGroup α] (M N : ∀ i, Matrix (m' i) (n' i) α) : blockDiagonal' (M - N) = blockDiagonal' M - blockDiagonal' N := map_sub (blockDiagonal'AddMonoidHom m' n' α) M N @[simp] theorem blockDiagonal'_mul [NonUnitalNonAssocSemiring α] [∀ i, Fintype (n' i)] [Fintype o] (M : ∀ i, Matrix (m' i) (n' i) α) (N : ∀ i, Matrix (n' i) (p' i) α) : (blockDiagonal' fun k => M k N k) = blockDiagonal' M * blockDiagonal' N := by ext ⟨k, i⟩ ⟨k', j⟩ simp only [blockDiagonal'_apply, mul_apply, ← Finset.univ_sigma_univ, Finset.sum_sigma] rw [Fintype.sum_eq_single k] · simp only [if_pos, dif_pos] split_ifs <;> simp · intro j' hj' exact Finset.sum_eq_zero fun _ _ => by rw [dif_neg hj'.symm, zero_mul] section variable (α m') /-- `Matrix.blockDiagonal'` as a `RingHom`. -/ @[simps] def blockDiagonal'RingHom [∀ i, DecidableEq (m' i)] [Fintype o] [∀ i, Fintype (m' i)] [NonAssocSemiring α] : (∀ i, Matrix (m' i) (m' i) α) →+* Matrix (Σ i, m' i) (Σ i, m' i) α := { blockDiagonal'AddMonoidHom m' m' α with toFun := blockDiagonal' map_one' := blockDiagonal'_one map_mul' := blockDiagonal'_mul } end @[simp] theorem blockDiagonal'_pow [∀ i, DecidableEq (m' i)] [Fintype o] [∀ i, Fintype (m' i)] [Semiring α] (M : ∀ i, Matrix (m' i) (m' i) α) (n : ℕ) : blockDiagonal' (M ^ n) = blockDiagonal' M ^ n := map_pow (blockDiagonal'RingHom m' α) M n @[simp] theorem blockDiagonal'_smul {R : Type*} [Zero α] [SMulZeroClass R α] (x : R) (M : ∀ i, Matrix (m' i) (n' i) α) : blockDiagonal' (x • M) = x • blockDiagonal' M := by ext simp only [blockDiagonal'_apply, Pi.smul_apply, smul_apply] split_ifs <;> simp end BlockDiagonal' section BlockDiag' /-- Extract a block from the diagonal of a block diagonal matrix. This is the block form of `Matrix.diag`, and the left-inverse of `Matrix.blockDiagonal'`. -/ def blockDiag' (M : Matrix (Σ i, m' i) (Σ i, n' i) α) (k : o) : Matrix (m' k) (n' k) α := of fun i j => M ⟨k, i⟩ ⟨k, j⟩ -- TODO: set as an equation lemma for `blockDiag'`, see https://github.com/leanprover-community/mathlib4/pull/3024 theorem blockDiag'_apply (M : Matrix (Σ i, m' i) (Σ i, n' i) α) (k : o) (i j) : blockDiag' M k i j = M ⟨k, i⟩ ⟨k, j⟩ := rfl theorem blockDiag'_map (M : Matrix (Σ i, m' i) (Σ i, n' i) α) (f : α → β) :	blockDiag' (M.map f) = fun k => (blockDiag' M k).map f := rfl @[simp]	Mathlib/Data/Matrix/Block.lean	724	727
/- Copyright (c) 2022 Aaron Anderson. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Aaron Anderson, Gabin Kolly -/ import Mathlib.ModelTheory.FinitelyGenerated import Mathlib.ModelTheory.PartialEquiv import Mathlib.ModelTheory.Bundled import Mathlib.Algebra.Order.Archimedean.Basic /-! # Fraïssé Classes and Fraïssé Limits This file pertains to the ages of countable first-order structures. The age of a structure is the class of all finitely-generated structures that embed into it. Of particular interest are Fraïssé classes, which are exactly the ages of countable ultrahomogeneous structures. To each is associated a unique (up to nonunique isomorphism) Fraïssé limit - the countable ultrahomogeneous structure with that age. ## Main Definitions - `FirstOrder.Language.age` is the class of finitely-generated structures that embed into a particular structure. - A class `K` is `FirstOrder.Language.Hereditary` when all finitely-generated structures that embed into structures in `K` are also in `K`. - A class `K` has `FirstOrder.Language.JointEmbedding` when for every `M`, `N` in `K`, there is another structure in `K` into which both `M` and `N` embed. - A class `K` has `FirstOrder.Language.Amalgamation` when for any pair of embeddings of a structure `M` in `K` into other structures in `K`, those two structures can be embedded into a fourth structure in `K` such that the resulting square of embeddings commutes. - `FirstOrder.Language.IsFraisse` indicates that a class is nonempty, essentially countable, and satisfies the hereditary, joint embedding, and amalgamation properties. - `FirstOrder.Language.IsFraisseLimit` indicates that a structure is a Fraïssé limit for a given class. ## Main Results - We show that the age of any structure is isomorphism-invariant and satisfies the hereditary and joint-embedding properties. - `FirstOrder.Language.age.countable_quotient` shows that the age of any countable structure is essentially countable. - `FirstOrder.Language.exists_countable_is_age_of_iff` gives necessary and sufficient conditions for a class to be the age of a countable structure in a language with countably many functions. - `FirstOrder.Language.IsFraisseLimit.nonempty_equiv` shows that any class which is Fraïssé has at most one Fraïssé limit up to equivalence. - `FirstOrder.Language.empty.isFraisseLimit_of_countable_infinite` shows that any countably infinite structure in the empty language is a Fraïssé limit of the class of finite structures. - `FirstOrder.Language.empty.isFraisse_finite` shows that the class of finite structures in the empty language is Fraïssé. ## Implementation Notes - Classes of structures are formalized with `Set (Bundled L.Structure)`. - Some results pertain to countable limit structures, others to countably-generated limit structures. In the case of a language with countably many function symbols, these are equivalent. ## References - [W. Hodges, A Shorter Model Theory][Hodges97] - [K. Tent, M. Ziegler, A Course in Model Theory][Tent_Ziegler] ## TODO - Show existence of Fraïssé limits -/ universe u v w w' open scoped FirstOrder open Set CategoryTheory namespace FirstOrder namespace Language open Structure Substructure variable (L : Language.{u, v}) /-! ### The Age of a Structure and Fraïssé Classes -/ /-- The age of a structure `M` is the class of finitely-generated structures that embed into it. -/ def age (M : Type w) [L.Structure M] : Set (Bundled.{w} L.Structure) := {N \| Structure.FG L N ∧ Nonempty (N ↪[L] M)} variable {L} variable (K : Set (Bundled.{w} L.Structure)) /-- A class `K` has the hereditary property when all finitely-generated structures that embed into structures in `K` are also in `K`. -/ def Hereditary : Prop := ∀ M : Bundled.{w} L.Structure, M ∈ K → L.age M ⊆ K /-- A class `K` has the joint embedding property when for every `M`, `N` in `K`, there is another structure in `K` into which both `M` and `N` embed. -/ def JointEmbedding : Prop := DirectedOn (fun M N : Bundled.{w} L.Structure => Nonempty (M ↪[L] N)) K /-- A class `K` has the amalgamation property when for any pair of embeddings of a structure `M` in `K` into other structures in `K`, those two structures can be embedded into a fourth structure in `K` such that the resulting square of embeddings commutes. -/ def Amalgamation : Prop := ∀ (M N P : Bundled.{w} L.Structure) (MN : M ↪[L] N) (MP : M ↪[L] P), M ∈ K → N ∈ K → P ∈ K → ∃ (Q : Bundled.{w} L.Structure) (NQ : N ↪[L] Q) (PQ : P ↪[L] Q), Q ∈ K ∧ NQ.comp MN = PQ.comp MP /-- A Fraïssé class is a nonempty, essentially countable class of structures satisfying the hereditary, joint embedding, and amalgamation properties. -/ class IsFraisse : Prop where is_nonempty : K.Nonempty FG : ∀ M : Bundled.{w} L.Structure, M ∈ K → Structure.FG L M is_essentially_countable : (Quotient.mk' '' K).Countable hereditary : Hereditary K jointEmbedding : JointEmbedding K amalgamation : Amalgamation K variable {K} (L) (M : Type w) [Structure L M] theorem age.is_equiv_invariant (N P : Bundled.{w} L.Structure) (h : Nonempty (N ≃[L] P)) : N ∈ L.age M ↔ P ∈ L.age M := and_congr h.some.fg_iff ⟨Nonempty.map fun x => Embedding.comp x h.some.symm.toEmbedding, Nonempty.map fun x => Embedding.comp x h.some.toEmbedding⟩ variable {L} {M} {N : Type w} [Structure L N] theorem Embedding.age_subset_age (MN : M ↪[L] N) : L.age M ⊆ L.age N := fun _ => And.imp_right (Nonempty.map MN.comp) theorem Equiv.age_eq_age (MN : M ≃[L] N) : L.age M = L.age N := le_antisymm MN.toEmbedding.age_subset_age MN.symm.toEmbedding.age_subset_age theorem Structure.FG.mem_age_of_equiv {M N : Bundled L.Structure} (h : Structure.FG L M) (MN : Nonempty (M ≃[L] N)) : N ∈ L.age M := ⟨MN.some.fg_iff.1 h, ⟨MN.some.symm.toEmbedding⟩⟩ theorem Hereditary.is_equiv_invariant_of_fg (h : Hereditary K) (fg : ∀ M : Bundled.{w} L.Structure, M ∈ K → Structure.FG L M) (M N : Bundled.{w} L.Structure) (hn : Nonempty (M ≃[L] N)) : M ∈ K ↔ N ∈ K := ⟨fun MK => h M MK ((fg M MK).mem_age_of_equiv hn), fun NK => h N NK ((fg N NK).mem_age_of_equiv ⟨hn.some.symm⟩)⟩ theorem IsFraisse.is_equiv_invariant [h : IsFraisse K] {M N : Bundled.{w} L.Structure} (hn : Nonempty (M ≃[L] N)) : M ∈ K ↔ N ∈ K := h.hereditary.is_equiv_invariant_of_fg h.FG M N hn variable (M) theorem age.nonempty : (L.age M).Nonempty := ⟨Bundled.of (Substructure.closure L (∅ : Set M)), (fg_iff_structure_fg _).1 (fg_closure Set.finite_empty), ⟨Substructure.subtype _⟩⟩ theorem age.hereditary : Hereditary (L.age M) := fun _ hN _ hP => hN.2.some.age_subset_age hP theorem age.jointEmbedding : JointEmbedding (L.age M) := fun _ hN _ hP => ⟨Bundled.of (↥(hN.2.some.toHom.range ⊔ hP.2.some.toHom.range)), ⟨(fg_iff_structure_fg _).1 ((hN.1.range hN.2.some.toHom).sup (hP.1.range hP.2.some.toHom)), ⟨Substructure.subtype _⟩⟩, ⟨Embedding.comp (inclusion le_sup_left) hN.2.some.equivRange.toEmbedding⟩, ⟨Embedding.comp (inclusion le_sup_right) hP.2.some.equivRange.toEmbedding⟩⟩ variable {M} in theorem age.fg_substructure {S : L.Substructure M} (fg : S.FG) : Bundled.mk S ∈ L.age M := by exact ⟨(Substructure.fg_iff_structure_fg _).1 fg, ⟨subtype _⟩⟩ /-- Any class in the age of a structure has a representative which is a finitely generated substructure. -/ theorem age.has_representative_as_substructure : ∀ C ∈ Quotient.mk' '' L.age M, ∃ V : {V : L.Substructure M // FG V}, ⟦Bundled.mk V⟧ = C := by rintro _ ⟨N, ⟨N_fg, ⟨N_incl⟩⟩, N_eq⟩ refine N_eq.symm ▸ ⟨⟨N_incl.toHom.range, ?_⟩, Quotient.sound ⟨N_incl.equivRange.symm⟩⟩ exact FG.range N_fg (Embedding.toHom N_incl) /-- The age of a countable structure is essentially countable (has countably many isomorphism classes). -/ theorem age.countable_quotient [h : Countable M] : (Quotient.mk' '' L.age M).Countable := by classical refine (congr_arg _ (Set.ext <\| Quotient.forall.2 fun N => ?_)).mp (countable_range fun s : Finset M => ⟦⟨closure L (s : Set M), inferInstance⟩⟧) constructor · rintro ⟨s, hs⟩ use Bundled.of (closure L (s : Set M)) exact ⟨⟨(fg_iff_structure_fg _).1 (fg_closure s.finite_toSet), ⟨Substructure.subtype _⟩⟩, hs⟩ · simp only [mem_range, Quotient.eq] rintro ⟨P, ⟨⟨s, hs⟩, ⟨PM⟩⟩, hP2⟩ refine ⟨s.image PM, Setoid.trans (b := P) ?_ <\| Quotient.exact hP2⟩ rw [← Embedding.coe_toHom, Finset.coe_image, closure_image PM.toHom, hs, ← Hom.range_eq_map] exact ⟨PM.equivRange.symm⟩ -- This is not a simp-lemma because it does not apply to itself. /-- The age of a direct limit of structures is the union of the ages of the structures. -/ theorem age_directLimit {ι : Type w} [Preorder ι] [IsDirected ι (· ≤ ·)] [Nonempty ι] (G : ι → Type max w w') [∀ i, L.Structure (G i)] (f : ∀ i j, i ≤ j → G i ↪[L] G j) [DirectedSystem G fun i j h => f i j h] : L.age (DirectLimit G f) = ⋃ i : ι, L.age (G i) := by classical ext M simp only [mem_iUnion] constructor · rintro ⟨Mfg, ⟨e⟩⟩ obtain ⟨s, hs⟩ := Mfg.range e.toHom let out := @Quotient.out _ (DirectLimit.setoid G f) obtain ⟨i, hi⟩ := Finset.exists_le (s.image (Sigma.fst ∘ out)) have e' := (DirectLimit.of L ι G f i).equivRange.symm.toEmbedding refine ⟨i, Mfg, ⟨e'.comp ((Substructure.inclusion ?_).comp e.equivRange.toEmbedding)⟩⟩ rw [← hs, closure_le] intro x hx refine ⟨f (out x).1 i (hi (out x).1 (Finset.mem_image_of_mem _ hx)) (out x).2, ?_⟩ rw [Embedding.coe_toHom, DirectLimit.of_apply, @Quotient.mk_eq_iff_out _ (_), DirectLimit.equiv_iff G f _ (hi (out x).1 (Finset.mem_image_of_mem _ hx)), DirectedSystem.map_self] · rintro ⟨i, Mfg, ⟨e⟩⟩ exact ⟨Mfg, ⟨Embedding.comp (DirectLimit.of L ι G f i) e⟩⟩ /-- Sufficient conditions for a class to be the age of a countably-generated structure. -/ theorem exists_cg_is_age_of (hn : K.Nonempty) (hc : (Quotient.mk' '' K).Countable) (fg : ∀ M : Bundled.{w} L.Structure, M ∈ K → Structure.FG L M) (hp : Hereditary K) (jep : JointEmbedding K) : ∃ M : Bundled.{w} L.Structure, Structure.CG L M ∧ L.age M = K := by obtain ⟨F, hF⟩ := hc.exists_eq_range (hn.image _) simp only [Set.ext_iff, Quotient.forall, mem_image, mem_range, Quotient.eq'] at hF simp_rw [Quotient.eq_mk_iff_out] at hF have hF' : ∀ n : ℕ, (F n).out ∈ K := by intro n obtain ⟨P, hP1, hP2⟩ := (hF (F n).out).2 ⟨n, Setoid.refl _⟩ -- Porting note: fix hP2 because `Quotient.out (Quotient.mk' x) ≈ a` was not simplified -- to `x ≈ a` in hF replace hP2 := Setoid.trans (Setoid.symm (Quotient.mk_out P)) hP2 exact (hp.is_equiv_invariant_of_fg fg _ _ hP2).1 hP1 choose P hPK hP hFP using fun (N : K) (n : ℕ) => jep N N.2 (F (n + 1)).out (hF' _) let G : ℕ → K := @Nat.rec (fun _ => K) ⟨(F 0).out, hF' 0⟩ fun n N => ⟨P N n, hPK N n⟩ -- Porting note: was -- let f : ∀ i j, i ≤ j → G i ↪[L] G j := DirectedSystem.natLeRec fun n => (hP _ n).some let f : ∀ (i j : ℕ), i ≤ j → (G i).val ↪[L] (G j).val := by refine DirectedSystem.natLERec (G' := fun i => (G i).val) (L := L) ?_ dsimp only [G] exact fun n => (hP _ n).some have : DirectedSystem (fun n ↦ (G n).val) fun i j h ↦ ↑(f i j h) := by dsimp [f, G]; infer_instance refine ⟨Bundled.of (@DirectLimit L _ _ (fun n ↦ (G n).val) _ f _ _), ?_, ?_⟩ · exact DirectLimit.cg _ (fun n => (fg _ (G n).2).cg) · refine (age_directLimit (fun n ↦ (G n).val) f).trans (subset_antisymm (iUnion_subset fun n N hN => hp (G n).val (G n).2 hN) fun N KN => ?_) have : Quotient.out (Quotient.mk' N) ≈ N := Quotient.eq_mk_iff_out.mp rfl	obtain ⟨n, ⟨e⟩⟩ := (hF N).1 ⟨N, KN, this⟩ refine mem_iUnion_of_mem n ⟨fg _ KN, ⟨Embedding.comp ?_ e.symm.toEmbedding⟩⟩ rcases n with - \| n · dsimp [G]; exact Embedding.refl _ _ · dsimp [G]; exact (hFP _ n).some theorem exists_countable_is_age_of_iff [Countable (Σ l, L.Functions l)] : (∃ M : Bundled.{w} L.Structure, Countable M ∧ L.age M = K) ↔ K.Nonempty ∧ (∀ M N : Bundled.{w} L.Structure, Nonempty (M ≃[L] N) → (M ∈ K ↔ N ∈ K)) ∧ (Quotient.mk' '' K).Countable ∧ (∀ M : Bundled.{w} L.Structure, M ∈ K → Structure.FG L M) ∧ Hereditary K ∧ JointEmbedding K := by constructor	Mathlib/ModelTheory/Fraisse.lean	250	261
/- Copyright (c) 2022 Oliver Nash. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Oliver Nash -/ import Mathlib.Algebra.Lie.Nilpotent import Mathlib.Algebra.Lie.Normalizer /-! # Engel's theorem This file contains a proof of Engel's theorem providing necessary and sufficient conditions for Lie algebras and Lie modules to be nilpotent. The key result `LieModule.isNilpotent_iff_forall` says that if `M` is a Lie module of a Noetherian Lie algebra `L`, then `M` is nilpotent iff the image of `L → End(M)` consists of nilpotent elements. In the special case that we have the adjoint representation `M = L`, this says that a Lie algebra is nilpotent iff `ad x : End(L)` is nilpotent for all `x : L`. Engel's theorem is true for any coefficients (i.e., it is really a theorem about Lie rings) and so we work with coefficients in any commutative ring `R` throughout. On the other hand, Engel's theorem is not true for infinite-dimensional Lie algebras and so a finite-dimensionality assumption is required. We prove the theorem subject to the assumption that the Lie algebra is Noetherian as an `R`-module, though actually we only need the slightly weaker property that the relation `>` is well-founded on the complete lattice of Lie subalgebras. ## Remarks about the proof Engel's theorem is usually proved in the special case that the coefficients are a field, and uses an inductive argument on the dimension of the Lie algebra. One begins by choosing either a maximal proper Lie subalgebra (in some proofs) or a maximal nilpotent Lie subalgebra (in other proofs, at the cost of obtaining a weaker end result). Since we work with general coefficients, we cannot induct on dimension and an alternate approach must be taken. The key ingredient is the concept of nilpotency, not just for Lie algebras, but for Lie modules. Using this concept, we define an _Engelian Lie algebra_ `LieAlgebra.IsEngelian` to be one for which a Lie module is nilpotent whenever the action consists of nilpotent endomorphisms. The argument then proceeds by selecting a maximal Engelian Lie subalgebra and showing that it cannot be proper. The first part of the traditional statement of Engel's theorem consists of the statement that if `M` is a non-trivial `R`-module and `L ⊆ End(M)` is a finite-dimensional Lie subalgebra of nilpotent elements, then there exists a non-zero element `m : M` that is annihilated by every element of `L`. This follows trivially from the result established here `LieModule.isNilpotent_iff_forall`, that `M` is a nilpotent Lie module over `L`, since the last non-zero term in the lower central series will consist of such elements `m` (see: `LieModule.nontrivial_max_triv_of_isNilpotent`). It seems that this result has not previously been established at this level of generality. The second part of the traditional statement of Engel's theorem concerns nilpotency of the Lie algebra and a proof of this for general coefficients appeared in the literature as long ago [as 1937](zorn1937). This also follows trivially from `LieModule.isNilpotent_iff_forall` simply by taking `M = L`. It is pleasing that the two parts of the traditional statements of Engel's theorem are thus unified into a single statement about nilpotency of Lie modules. This is not usually emphasised. ## Main definitions * `LieAlgebra.IsEngelian` * `LieAlgebra.isEngelian_of_isNoetherian` * `LieModule.isNilpotent_iff_forall` * `LieAlgebra.isNilpotent_iff_forall` -/ universe u₁ u₂ u₃ u₄ variable {R : Type u₁} {L : Type u₂} {L₂ : Type u₃} {M : Type u₄} variable [CommRing R] [LieRing L] [LieAlgebra R L] [LieRing L₂] [LieAlgebra R L₂] variable [AddCommGroup M] [Module R M] [LieRingModule L M] [LieModule R L M] namespace LieSubmodule open LieModule variable {I : LieIdeal R L} {x : L} (hxI : (R ∙ x) ⊔ I = ⊤) include hxI theorem exists_smul_add_of_span_sup_eq_top (y : L) : ∃ t : R, ∃ z ∈ I, y = t • x + z := by have hy : y ∈ (⊤ : Submodule R L) := Submodule.mem_top simp only [← hxI, Submodule.mem_sup, Submodule.mem_span_singleton] at hy obtain ⟨-, ⟨t, rfl⟩, z, hz, rfl⟩ := hy exact ⟨t, z, hz, rfl⟩ theorem lie_top_eq_of_span_sup_eq_top (N : LieSubmodule R L M) : (↑⁅(⊤ : LieIdeal R L), N⁆ : Submodule R M) = (N : Submodule R M).map (toEnd R L M x) ⊔ (↑⁅I, N⁆ : Submodule R M) := by simp only [lieIdeal_oper_eq_linear_span', Submodule.sup_span, mem_top, exists_prop, true_and, Submodule.map_coe, toEnd_apply_apply] refine le_antisymm (Submodule.span_le.mpr ?_) (Submodule.span_mono fun z hz => ?_) · rintro z ⟨y, n, hn : n ∈ N, rfl⟩ obtain ⟨t, z, hz, rfl⟩ := exists_smul_add_of_span_sup_eq_top hxI y simp only [SetLike.mem_coe, Submodule.span_union, Submodule.mem_sup] exact ⟨t • ⁅x, n⁆, Submodule.subset_span ⟨t • n, N.smul_mem' t hn, lie_smul t x n⟩, ⁅z, n⁆, Submodule.subset_span ⟨z, hz, n, hn, rfl⟩, by simp⟩ · rcases hz with (⟨m, hm, rfl⟩ \| ⟨y, -, m, hm, rfl⟩) exacts [⟨x, m, hm, rfl⟩, ⟨y, m, hm, rfl⟩] theorem lcs_le_lcs_of_is_nilpotent_span_sup_eq_top {n i j : ℕ} (hxn : toEnd R L M x ^ n = 0) (hIM : lowerCentralSeries R L M i ≤ I.lcs M j) : lowerCentralSeries R L M (i + n) ≤ I.lcs M (j + 1) := by suffices ∀ l, ((⊤ : LieIdeal R L).lcs M (i + l) : Submodule R M) ≤ (I.lcs M j : Submodule R M).map (toEnd R L M x ^ l) ⊔ (I.lcs M (j + 1) : Submodule R M) by simpa only [bot_sup_eq, LieIdeal.incl_coe, Submodule.map_zero, hxn] using this n intro l induction l with \| zero => simp only [add_zero, LieIdeal.lcs_succ, pow_zero, Module.End.one_eq_id, Submodule.map_id] exact le_sup_of_le_left hIM \| succ l ih => simp only [LieIdeal.lcs_succ, i.add_succ l, lie_top_eq_of_span_sup_eq_top hxI, sup_le_iff] refine ⟨(Submodule.map_mono ih).trans ?_, le_sup_of_le_right ?_⟩ · rw [Submodule.map_sup, ← Submodule.map_comp, ← Module.End.mul_eq_comp, ← pow_succ', ← I.lcs_succ] exact sup_le_sup_left coe_map_toEnd_le _ · refine le_trans (mono_lie_right I ?_) (mono_lie_right I hIM) exact antitone_lowerCentralSeries R L M le_self_add theorem isNilpotentOfIsNilpotentSpanSupEqTop (hnp : IsNilpotent <\| toEnd R L M x) (hIM : IsNilpotent I M) : IsNilpotent L M := by obtain ⟨n, hn⟩ := hnp obtain ⟨k, hk⟩ := IsNilpotent.nilpotent R I M have hk' : I.lcs M k = ⊥ := by simp only [← toSubmodule_inj, I.coe_lcs_eq, hk, bot_toSubmodule] suffices ∀ l, lowerCentralSeries R L M (l * n) ≤ I.lcs M l by rw [isNilpotent_iff R] use k * n simpa [hk'] using this k intro l induction l with \| zero => simp \| succ l ih => exact (l.succ_mul n).symm ▸ lcs_le_lcs_of_is_nilpotent_span_sup_eq_top hxI hn ih end LieSubmodule section LieAlgebra -- Porting note: somehow this doesn't hide `LieModule.IsNilpotent`, so `_root_.IsNilpotent` is used -- a number of times below. open LieModule hiding IsNilpotent variable (R L) /-- A Lie algebra `L` is said to be Engelian if a sufficient condition for any `L`-Lie module `M` to be nilpotent is that the image of the map `L → End(M)` consists of nilpotent elements. Engel's theorem `LieAlgebra.isEngelian_of_isNoetherian` states that any Noetherian Lie algebra is Engelian. -/ def LieAlgebra.IsEngelian : Prop := ∀ (M : Type u₄) [AddCommGroup M] [Module R M] [LieRingModule L M] [LieModule R L M], (∀ x : L, _root_.IsNilpotent (toEnd R L M x)) → LieModule.IsNilpotent L M variable {R L} theorem LieAlgebra.isEngelian_of_subsingleton [Subsingleton L] : LieAlgebra.IsEngelian R L := by intro M _i1 _i2 _i3 _i4 _h use 1 simp theorem Function.Surjective.isEngelian {f : L →ₗ⁅R⁆ L₂} (hf : Function.Surjective f) (h : LieAlgebra.IsEngelian.{u₁, u₂, u₄} R L) : LieAlgebra.IsEngelian.{u₁, u₃, u₄} R L₂ := by intro M _i1 _i2 _i3 _i4 h' letI : LieRingModule L M := LieRingModule.compLieHom M f letI : LieModule R L M := compLieHom M f have hnp : ∀ x, IsNilpotent (toEnd R L M x) := fun x => h' (f x) have surj_id : Function.Surjective (LinearMap.id : M →ₗ[R] M) := Function.surjective_id haveI : LieModule.IsNilpotent L M := h M hnp apply hf.lieModuleIsNilpotent _ surj_id aesop theorem LieEquiv.isEngelian_iff (e : L ≃ₗ⁅R⁆ L₂) : LieAlgebra.IsEngelian.{u₁, u₂, u₄} R L ↔ LieAlgebra.IsEngelian.{u₁, u₃, u₄} R L₂ := ⟨e.surjective.isEngelian, e.symm.surjective.isEngelian⟩ theorem LieAlgebra.exists_engelian_lieSubalgebra_of_lt_normalizer {K : LieSubalgebra R L} (hK₁ : LieAlgebra.IsEngelian.{u₁, u₂, u₄} R K) (hK₂ : K < K.normalizer) : ∃ (K' : LieSubalgebra R L), LieAlgebra.IsEngelian.{u₁, u₂, u₄} R K' ∧ K < K' := by obtain ⟨x, hx₁, hx₂⟩ := SetLike.exists_of_lt hK₂ let K' : LieSubalgebra R L := { (R ∙ x) ⊔ (K : Submodule R L) with lie_mem' := fun {y z} => LieSubalgebra.lie_mem_sup_of_mem_normalizer hx₁ } have hxK' : x ∈ K' := Submodule.mem_sup_left (Submodule.subset_span (Set.mem_singleton _)) have hKK' : K ≤ K' := (LieSubalgebra.toSubmodule_le_toSubmodule K K').mp le_sup_right have hK' : K' ≤ K.normalizer := by rw [← LieSubalgebra.toSubmodule_le_toSubmodule] exact sup_le ((Submodule.span_singleton_le_iff_mem _ _).mpr hx₁) hK₂.le refine ⟨K', ?_, lt_iff_le_and_ne.mpr ⟨hKK', fun contra => hx₂ (contra.symm ▸ hxK')⟩⟩ intro M _i1 _i2 _i3 _i4 h obtain ⟨I, hI₁ : (I : LieSubalgebra R K') = LieSubalgebra.ofLe hKK'⟩ := LieSubalgebra.exists_nested_lieIdeal_ofLe_normalizer hKK' hK' have hI₂ : (R ∙ (⟨x, hxK'⟩ : K')) ⊔ (LieSubmodule.toSubmodule I) = ⊤ := by rw [← LieIdeal.toLieSubalgebra_toSubmodule R K' I, hI₁] apply Submodule.map_injective_of_injective (K' : Submodule R L).injective_subtype simp only [LieSubalgebra.coe_ofLe, Submodule.map_sup, Submodule.map_subtype_range_inclusion, Submodule.map_top, Submodule.range_subtype] rw [Submodule.map_subtype_span_singleton] have e : K ≃ₗ⁅R⁆ I := (LieSubalgebra.equivOfLe hKK').trans (LieEquiv.ofEq _ _ ((LieSubalgebra.coe_set_eq _ _).mpr hI₁.symm)) have hI₃ : LieAlgebra.IsEngelian R I := e.isEngelian_iff.mp hK₁ exact LieSubmodule.isNilpotentOfIsNilpotentSpanSupEqTop hI₂ (h _) (hI₃ _ fun x => h x) attribute [local instance] LieSubalgebra.subsingleton_bot /-- Engel's theorem. Note that this implies all traditional forms of Engel's theorem via `LieModule.nontrivial_max_triv_of_isNilpotent`, `LieModule.isNilpotent_iff_forall`, `LieAlgebra.isNilpotent_iff_forall`. -/ theorem LieAlgebra.isEngelian_of_isNoetherian [IsNoetherian R L] : LieAlgebra.IsEngelian R L := by intro M _i1 _i2 _i3 _i4 h rw [← isNilpotent_range_toEnd_iff R] let L' := (toEnd R L M).range replace h : ∀ y : L', _root_.IsNilpotent (y : Module.End R M) := by rintro ⟨-, ⟨y, rfl⟩⟩ simp [h] change LieModule.IsNilpotent L' M let s := {K : LieSubalgebra R L' \| LieAlgebra.IsEngelian R K} have hs : s.Nonempty := ⟨⊥, LieAlgebra.isEngelian_of_subsingleton⟩ suffices ⊤ ∈ s by rw [← isNilpotent_of_top_iff (R := R)] apply this M simp [LieSubalgebra.toEnd_eq, h] have : ∀ K ∈ s, K ≠ ⊤ → ∃ K' ∈ s, K < K' := by rintro K (hK₁ : LieAlgebra.IsEngelian R K) hK₂ apply LieAlgebra.exists_engelian_lieSubalgebra_of_lt_normalizer hK₁ apply lt_of_le_of_ne K.le_normalizer rw [Ne, eq_comm, K.normalizer_eq_self_iff, ← Ne, ← LieSubmodule.nontrivial_iff_ne_bot R K] have : Nontrivial (L' ⧸ K.toLieSubmodule) := by replace hK₂ : K.toLieSubmodule ≠ ⊤ := by rwa [Ne, ← LieSubmodule.toSubmodule_inj, K.coe_toLieSubmodule, LieSubmodule.top_toSubmodule, ← LieSubalgebra.top_toSubmodule, K.toSubmodule_inj] exact Submodule.Quotient.nontrivial_of_lt_top _ hK₂.lt_top have : LieModule.IsNilpotent K (L' ⧸ K.toLieSubmodule) := by refine hK₁ _ fun x => ?_ have hx := LieAlgebra.isNilpotent_ad_of_isNilpotent (h x) apply Module.End.IsNilpotent.mapQ ?_ hx intro X HX simp only [LieSubalgebra.coe_toLieSubmodule, LieSubalgebra.mem_toSubmodule] at HX simp only [LieSubalgebra.coe_toLieSubmodule, Submodule.mem_comap, ad_apply, LieSubalgebra.mem_toSubmodule] exact LieSubalgebra.lie_mem K x.prop HX exact nontrivial_max_triv_of_isNilpotent R K (L' ⧸ K.toLieSubmodule) haveI _i5 : IsNoetherian R L' := by refine isNoetherian_of_surjective L (LieHom.rangeRestrict (toEnd R L M)) ?_ simp only [LieHom.range_toSubmodule, LieHom.coe_toLinearMap, LinearMap.range_eq_top] exact LieHom.surjective_rangeRestrict (toEnd R L M) obtain ⟨K, hK₁, hK₂⟩ := (LieSubalgebra.wellFoundedGT_of_noetherian R L').wf.has_min s hs have hK₃ : K = ⊤ := by by_contra contra obtain ⟨K', hK'₁, hK'₂⟩ := this K hK₁ contra exact hK₂ K' hK'₁ hK'₂ exact hK₃ ▸ hK₁ /-- Engel's theorem. See also `LieModule.isNilpotent_iff_forall'` which assumes that `M` is Noetherian instead of `L`. -/ theorem LieModule.isNilpotent_iff_forall [IsNoetherian R L] : LieModule.IsNilpotent L M ↔ ∀ x, _root_.IsNilpotent <\| toEnd R L M x := ⟨fun _ ↦ isNilpotent_toEnd_of_isNilpotent R L M, fun h => LieAlgebra.isEngelian_of_isNoetherian M h⟩ /-- Engel's theorem. -/ theorem LieModule.isNilpotent_iff_forall' [IsNoetherian R M] : LieModule.IsNilpotent L M ↔ ∀ x, _root_.IsNilpotent <\| toEnd R L M x := by rw [← isNilpotent_range_toEnd_iff (R := R), LieModule.isNilpotent_iff_forall (R := R)]; simp /-- Engel's theorem. -/ theorem LieAlgebra.isNilpotent_iff_forall [IsNoetherian R L] : LieRing.IsNilpotent L ↔ ∀ x, _root_.IsNilpotent <\| LieAlgebra.ad R L x := LieModule.isNilpotent_iff_forall end LieAlgebra		Mathlib/Algebra/Lie/Engel.lean	290	292
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Kim Morrison -/ import Mathlib.Algebra.Group.Indicator import Mathlib.Algebra.Group.InjSurj import Mathlib.Data.Set.Finite.Basic import Mathlib.Tactic.FastInstance import Mathlib.Algebra.Group.Equiv.Defs /-! # Type of functions with finite support For any type `α` and any type `M` with zero, we define the type `Finsupp α M` (notation: `α →₀ M`) of finitely supported functions from `α` to `M`, i.e. the functions which are zero everywhere on `α` except on a finite set. Functions with finite support are used (at least) in the following parts of the library: * `MonoidAlgebra R M` and `AddMonoidAlgebra R M` are defined as `M →₀ R`; * polynomials and multivariate polynomials are defined as `AddMonoidAlgebra`s, hence they use `Finsupp` under the hood; * the linear combination of a family of vectors `v i` with coefficients `f i` (as used, e.g., to define linearly independent family `LinearIndependent`) is defined as a map `Finsupp.linearCombination : (ι → M) → (ι →₀ R) →ₗ[R] M`. Some other constructions are naturally equivalent to `α →₀ M` with some `α` and `M` but are defined in a different way in the library: * `Multiset α ≃+ α →₀ ℕ`; * `FreeAbelianGroup α ≃+ α →₀ ℤ`. Most of the theory assumes that the range is a commutative additive monoid. This gives us the big sum operator as a powerful way to construct `Finsupp` elements, which is defined in `Mathlib.Algebra.BigOperators.Finsupp.Basic`. Many constructions based on `α →₀ M` are `def`s rather than `abbrev`s to avoid reusing unwanted type class instances. E.g., `MonoidAlgebra`, `AddMonoidAlgebra`, and types based on these two have non-pointwise multiplication. ## Main declarations * `Finsupp`: The type of finitely supported functions from `α` to `β`. * `Finsupp.onFinset`: The restriction of a function to a `Finset` as a `Finsupp`. * `Finsupp.mapRange`: Composition of a `ZeroHom` with a `Finsupp`. * `Finsupp.embDomain`: Maps the domain of a `Finsupp` by an embedding. * `Finsupp.zipWith`: Postcomposition of two `Finsupp`s with a function `f` such that `f 0 0 = 0`. ## Notations This file adds `α →₀ M` as a global notation for `Finsupp α M`. We also use the following convention for `Type` variables in this file `α`, `β`, `γ`: types with no additional structure that appear as the first argument to `Finsupp` somewhere in the statement; * `ι` : an auxiliary index type; * `M`, `M'`, `N`, `P`: types with `Zero` or `(Add)(Comm)Monoid` structure; `M` is also used for a (semi)module over a (semi)ring. * `G`, `H`: groups (commutative or not, multiplicative or additive); * `R`, `S`: (semi)rings. ## Implementation notes This file is a `noncomputable theory` and uses classical logic throughout. ## TODO * Expand the list of definitions and important lemmas to the module docstring. -/ assert_not_exists CompleteLattice Submonoid noncomputable section open Finset Function variable {α β γ ι M M' N P G H R S : Type} /-- `Finsupp α M`, denoted `α →₀ M`, is the type of functions `f : α → M` such that `f x = 0` for all but finitely many `x`. -/ structure Finsupp (α : Type) (M : Type) [Zero M] where /-- The support of a finitely supported function (aka `Finsupp`). -/ support : Finset α /-- The underlying function of a bundled finitely supported function (aka `Finsupp`). -/ toFun : α → M /-- The witness that the support of a `Finsupp` is indeed the exact locus where its underlying function is nonzero. -/ mem_support_toFun : ∀ a, a ∈ support ↔ toFun a ≠ 0 @[inherit_doc] infixr:25 " →₀ " => Finsupp namespace Finsupp /-! ### Basic declarations about `Finsupp` -/ section Basic variable [Zero M] instance instFunLike : FunLike (α →₀ M) α M := ⟨toFun, by rintro ⟨s, f, hf⟩ ⟨t, g, hg⟩ (rfl : f = g) congr ext a exact (hf _).trans (hg _).symm⟩ @[ext] theorem ext {f g : α →₀ M} (h : ∀ a, f a = g a) : f = g := DFunLike.ext _ _ h lemma ne_iff {f g : α →₀ M} : f ≠ g ↔ ∃ a, f a ≠ g a := DFunLike.ne_iff @[simp, norm_cast] theorem coe_mk (f : α → M) (s : Finset α) (h : ∀ a, a ∈ s ↔ f a ≠ 0) : ⇑(⟨s, f, h⟩ : α →₀ M) = f := rfl instance instZero : Zero (α →₀ M) := ⟨⟨∅, 0, fun _ => ⟨fun h ↦ (not_mem_empty _ h).elim, fun H => (H rfl).elim⟩⟩⟩ @[simp, norm_cast] lemma coe_zero : ⇑(0 : α →₀ M) = 0 := rfl theorem zero_apply {a : α} : (0 : α →₀ M) a = 0 := rfl @[simp] theorem support_zero : (0 : α →₀ M).support = ∅ := rfl instance instInhabited : Inhabited (α →₀ M) := ⟨0⟩ @[simp] theorem mem_support_iff {f : α →₀ M} : ∀ {a : α}, a ∈ f.support ↔ f a ≠ 0 := @(f.mem_support_toFun) @[simp, norm_cast] theorem fun_support_eq (f : α →₀ M) : Function.support f = f.support := Set.ext fun _x => mem_support_iff.symm theorem not_mem_support_iff {f : α →₀ M} {a} : a ∉ f.support ↔ f a = 0 := not_iff_comm.1 mem_support_iff.symm @[simp, norm_cast] theorem coe_eq_zero {f : α →₀ M} : (f : α → M) = 0 ↔ f = 0 := by rw [← coe_zero, DFunLike.coe_fn_eq] theorem ext_iff' {f g : α →₀ M} : f = g ↔ f.support = g.support ∧ ∀ x ∈ f.support, f x = g x := ⟨fun h => h ▸ ⟨rfl, fun _ _ => rfl⟩, fun ⟨h₁, h₂⟩ => ext fun a => by classical exact if h : a ∈ f.support then h₂ a h else by have hf : f a = 0 := not_mem_support_iff.1 h have hg : g a = 0 := by rwa [h₁, not_mem_support_iff] at h rw [hf, hg]⟩ @[simp] theorem support_eq_empty {f : α →₀ M} : f.support = ∅ ↔ f = 0 := mod_cast @Function.support_eq_empty_iff _ _ _ f theorem support_nonempty_iff {f : α →₀ M} : f.support.Nonempty ↔ f ≠ 0 := by simp only [Finsupp.support_eq_empty, Finset.nonempty_iff_ne_empty, Ne] theorem card_support_eq_zero {f : α →₀ M} : #f.support = 0 ↔ f = 0 := by simp instance instDecidableEq [DecidableEq α] [DecidableEq M] : DecidableEq (α →₀ M) := fun f g => decidable_of_iff (f.support = g.support ∧ ∀ a ∈ f.support, f a = g a) ext_iff'.symm theorem finite_support (f : α →₀ M) : Set.Finite (Function.support f) := f.fun_support_eq.symm ▸ f.support.finite_toSet theorem support_subset_iff {s : Set α} {f : α →₀ M} : ↑f.support ⊆ s ↔ ∀ a ∉ s, f a = 0 := by simp only [Set.subset_def, mem_coe, mem_support_iff]; exact forall_congr' fun a => not_imp_comm /-- Given `Finite α`, `equivFunOnFinite` is the `Equiv` between `α →₀ β` and `α → β`. (All functions on a finite type are finitely supported.) -/ @[simps] def equivFunOnFinite [Finite α] : (α →₀ M) ≃ (α → M) where toFun := (⇑) invFun f := mk (Function.support f).toFinite.toFinset f fun _a => Set.Finite.mem_toFinset _ left_inv _f := ext fun _x => rfl right_inv _f := rfl @[simp] theorem equivFunOnFinite_symm_coe {α} [Finite α] (f : α →₀ M) : equivFunOnFinite.symm f = f := equivFunOnFinite.symm_apply_apply f @[simp] lemma coe_equivFunOnFinite_symm {α} [Finite α] (f : α → M) : ⇑(equivFunOnFinite.symm f) = f := rfl /-- If `α` has a unique term, the type of finitely supported functions `α →₀ β` is equivalent to `β`. -/ @[simps!] noncomputable def _root_.Equiv.finsuppUnique {ι : Type} [Unique ι] : (ι →₀ M) ≃ M := Finsupp.equivFunOnFinite.trans (Equiv.funUnique ι M) @[ext] theorem unique_ext [Unique α] {f g : α →₀ M} (h : f default = g default) : f = g := ext fun a => by rwa [Unique.eq_default a] end Basic /-! ### Declarations about `onFinset` -/ section OnFinset variable [Zero M] /-- `Finsupp.onFinset s f hf` is the finsupp function representing `f` restricted to the finset `s`. The function must be `0` outside of `s`. Use this when the set needs to be filtered anyways, otherwise a better set representation is often available. -/ def onFinset (s : Finset α) (f : α → M) (hf : ∀ a, f a ≠ 0 → a ∈ s) : α →₀ M where support := haveI := Classical.decEq M {a ∈ s \| f a ≠ 0} toFun := f mem_support_toFun := by classical simpa @[simp, norm_cast] lemma coe_onFinset (s : Finset α) (f : α → M) (hf) : onFinset s f hf = f := rfl @[simp] theorem onFinset_apply {s : Finset α} {f : α → M} {hf a} : (onFinset s f hf : α →₀ M) a = f a := rfl @[simp] theorem support_onFinset_subset {s : Finset α} {f : α → M} {hf} : (onFinset s f hf).support ⊆ s := by classical convert filter_subset (f · ≠ 0) s theorem mem_support_onFinset {s : Finset α} {f : α → M} (hf : ∀ a : α, f a ≠ 0 → a ∈ s) {a : α} : a ∈ (Finsupp.onFinset s f hf).support ↔ f a ≠ 0 := by rw [Finsupp.mem_support_iff, Finsupp.onFinset_apply] theorem support_onFinset [DecidableEq M] {s : Finset α} {f : α → M} (hf : ∀ a : α, f a ≠ 0 → a ∈ s) : (Finsupp.onFinset s f hf).support = {a ∈ s \| f a ≠ 0} := by dsimp [onFinset]; congr end OnFinset section OfSupportFinite variable [Zero M] /-- The natural `Finsupp` induced by the function `f` given that it has finite support. -/ noncomputable def ofSupportFinite (f : α → M) (hf : (Function.support f).Finite) : α →₀ M where support := hf.toFinset toFun := f mem_support_toFun _ := hf.mem_toFinset theorem ofSupportFinite_coe {f : α → M} {hf : (Function.support f).Finite} : (ofSupportFinite f hf : α → M) = f := rfl instance instCanLift : CanLift (α → M) (α →₀ M) (⇑) fun f => (Function.support f).Finite where prf f hf := ⟨ofSupportFinite f hf, rfl⟩ end OfSupportFinite /-! ### Declarations about `mapRange` -/ section MapRange variable [Zero M] [Zero N] [Zero P] /-- The composition of `f : M → N` and `g : α →₀ M` is `mapRange f hf g : α →₀ N`, which is well-defined when `f 0 = 0`. This preserves the structure on `f`, and exists in various bundled forms for when `f` is itself bundled (defined in `Mathlib/Data/Finsupp/Basic.lean`): * `Finsupp.mapRange.equiv` * `Finsupp.mapRange.zeroHom` * `Finsupp.mapRange.addMonoidHom` * `Finsupp.mapRange.addEquiv` * `Finsupp.mapRange.linearMap` * `Finsupp.mapRange.linearEquiv` -/ def mapRange (f : M → N) (hf : f 0 = 0) (g : α →₀ M) : α →₀ N := onFinset g.support (f ∘ g) fun a => by rw [mem_support_iff, not_imp_not]; exact fun H => (congr_arg f H).trans hf @[simp] theorem mapRange_apply {f : M → N} {hf : f 0 = 0} {g : α →₀ M} {a : α} : mapRange f hf g a = f (g a) := rfl @[simp] theorem mapRange_zero {f : M → N} {hf : f 0 = 0} : mapRange f hf (0 : α →₀ M) = 0 := ext fun _ => by simp only [hf, zero_apply, mapRange_apply] @[simp] theorem mapRange_id (g : α →₀ M) : mapRange id rfl g = g := ext fun _ => rfl theorem mapRange_comp (f : N → P) (hf : f 0 = 0) (f₂ : M → N) (hf₂ : f₂ 0 = 0) (h : (f ∘ f₂) 0 = 0) (g : α →₀ M) : mapRange (f ∘ f₂) h g = mapRange f hf (mapRange f₂ hf₂ g) := ext fun _ => rfl @[simp] lemma mapRange_mapRange (e₁ : N → P) (e₂ : M → N) (he₁ he₂) (f : α →₀ M) : mapRange e₁ he₁ (mapRange e₂ he₂ f) = mapRange (e₁ ∘ e₂) (by simp [*]) f := ext fun _ ↦ rfl theorem support_mapRange {f : M → N} {hf : f 0 = 0} {g : α →₀ M} : (mapRange f hf g).support ⊆ g.support := support_onFinset_subset theorem support_mapRange_of_injective {e : M → N} (he0 : e 0 = 0) (f : ι →₀ M) (he : Function.Injective e) : (Finsupp.mapRange e he0 f).support = f.support := by ext simp only [Finsupp.mem_support_iff, Ne, Finsupp.mapRange_apply] exact he.ne_iff' he0 lemma range_mapRange (e : M → N) (he₀ : e 0 = 0) : Set.range (Finsupp.mapRange (α := α) e he₀) = {g \| ∀ i, g i ∈ Set.range e} := by ext g simp only [Set.mem_range, Set.mem_setOf] constructor · rintro ⟨g, rfl⟩ i simp · intro h classical choose f h using h use onFinset g.support (Set.indicator g.support f) (by aesop) ext i simp only [mapRange_apply, onFinset_apply, Set.indicator_apply] split_ifs <;> simp_all /-- `Finsupp.mapRange` of a injective function is injective. -/ lemma mapRange_injective (e : M → N) (he₀ : e 0 = 0) (he : Injective e) : Injective (Finsupp.mapRange (α := α) e he₀) := by intro a b h rw [Finsupp.ext_iff] at h ⊢ simpa only [mapRange_apply, he.eq_iff] using h /-- `Finsupp.mapRange` of a surjective function is surjective. -/ lemma mapRange_surjective (e : M → N) (he₀ : e 0 = 0) (he : Surjective e) : Surjective (Finsupp.mapRange (α := α) e he₀) := by rw [← Set.range_eq_univ, range_mapRange, he.range_eq] simp end MapRange /-! ### Declarations about `embDomain` -/ section EmbDomain variable [Zero M] [Zero N] /-- Given `f : α ↪ β` and `v : α →₀ M`, `Finsupp.embDomain f v : β →₀ M` is the finitely supported function whose value at `f a : β` is `v a`. For a `b : β` outside the range of `f`, it is zero. -/ def embDomain (f : α ↪ β) (v : α →₀ M) : β →₀ M where support := v.support.map f toFun a₂ := haveI := Classical.decEq β if h : a₂ ∈ v.support.map f then v (v.support.choose (fun a₁ => f a₁ = a₂) (by rcases Finset.mem_map.1 h with ⟨a, ha, rfl⟩ exact ExistsUnique.intro a ⟨ha, rfl⟩ fun b ⟨_, hb⟩ => f.injective hb)) else 0 mem_support_toFun a₂ := by dsimp split_ifs with h · simp only [h, true_iff, Ne] rw [← not_mem_support_iff, not_not] classical apply Finset.choose_mem · simp only [h, Ne, ne_self_iff_false, not_true_eq_false] @[simp] theorem support_embDomain (f : α ↪ β) (v : α →₀ M) : (embDomain f v).support = v.support.map f := rfl @[simp] theorem embDomain_zero (f : α ↪ β) : (embDomain f 0 : β →₀ M) = 0 := rfl @[simp] theorem embDomain_apply (f : α ↪ β) (v : α →₀ M) (a : α) : embDomain f v (f a) = v a := by classical simp_rw [embDomain, coe_mk, mem_map'] split_ifs with h · refine congr_arg (v : α → M) (f.inj' ?_) exact Finset.choose_property (fun a₁ => f a₁ = f a) _ _ · exact (not_mem_support_iff.1 h).symm theorem embDomain_notin_range (f : α ↪ β) (v : α →₀ M) (a : β) (h : a ∉ Set.range f) : embDomain f v a = 0 := by classical refine dif_neg (mt (fun h => ?_) h) rcases Finset.mem_map.1 h with ⟨a, _h, rfl⟩	exact Set.mem_range_self a	Mathlib/Data/Finsupp/Defs.lean	408	409
/- Copyright (c) 2016 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Leonardo de Moura, Mario Carneiro, Johannes Hölzl -/ import Mathlib.Algebra.Order.Group.Unbundled.Basic import Mathlib.Algebra.Order.Monoid.Defs import Mathlib.Algebra.Order.Sub.Defs import Mathlib.Util.AssertExists /-! # Ordered groups This file defines bundled ordered groups and develops a few basic results. ## Implementation details Unfortunately, the number of `'` appended to lemmas in this file may differ between the multiplicative and the additive version of a lemma. The reason is that we did not want to change existing names in the library. -/ /- `NeZero` theory should not be needed at this point in the ordered algebraic hierarchy. -/ assert_not_imported Mathlib.Algebra.NeZero open Function universe u variable {α : Type u} /-- An ordered additive commutative group is an additive commutative group with a partial order in which addition is strictly monotone. -/ @[deprecated "Use `[AddCommGroup α] [PartialOrder α] [IsOrderedAddMonoid α]` instead." (since := "2025-04-10")] structure OrderedAddCommGroup (α : Type u) extends AddCommGroup α, PartialOrder α where /-- Addition is monotone in an ordered additive commutative group. -/ protected add_le_add_left : ∀ a b : α, a ≤ b → ∀ c : α, c + a ≤ c + b set_option linter.existingAttributeWarning false in /-- An ordered commutative group is a commutative group with a partial order in which multiplication is strictly monotone. -/ @[to_additive, deprecated "Use `[CommGroup α] [PartialOrder α] [IsOrderedMonoid α]` instead." (since := "2025-04-10")] structure OrderedCommGroup (α : Type u) extends CommGroup α, PartialOrder α where /-- Multiplication is monotone in an ordered commutative group. -/ protected mul_le_mul_left : ∀ a b : α, a ≤ b → ∀ c : α, c * a ≤ c * b alias OrderedCommGroup.mul_lt_mul_left' := mul_lt_mul_left' attribute [to_additive OrderedAddCommGroup.add_lt_add_left] OrderedCommGroup.mul_lt_mul_left' alias OrderedCommGroup.le_of_mul_le_mul_left := le_of_mul_le_mul_left' attribute [to_additive] OrderedCommGroup.le_of_mul_le_mul_left alias OrderedCommGroup.lt_of_mul_lt_mul_left := lt_of_mul_lt_mul_left' attribute [to_additive] OrderedCommGroup.lt_of_mul_lt_mul_left -- See note [lower instance priority] @[to_additive IsOrderedAddMonoid.toIsOrderedCancelAddMonoid] instance (priority := 100) IsOrderedMonoid.toIsOrderedCancelMonoid [CommGroup α] [PartialOrder α] [IsOrderedMonoid α] : IsOrderedCancelMonoid α where le_of_mul_le_mul_left a b c bc := by simpa using mul_le_mul_left' bc a⁻¹ le_of_mul_le_mul_right a b c bc := by simpa using mul_le_mul_left' bc a⁻¹ /-! ### Linearly ordered commutative groups -/ set_option linter.deprecated false in /-- A linearly ordered additive commutative group is an additive commutative group with a linear order in which addition is monotone. -/ @[deprecated "Use `[AddCommGroup α] [LinearOrder α] [IsOrderedAddMonoid α]` instead." (since := "2025-04-10")] structure LinearOrderedAddCommGroup (α : Type u) extends OrderedAddCommGroup α, LinearOrder α set_option linter.existingAttributeWarning false in set_option linter.deprecated false in /-- A linearly ordered commutative group is a commutative group with a linear order in which multiplication is monotone. -/ @[to_additive, deprecated "Use `[CommGroup α] [LinearOrder α] [IsOrderedMonoid α]` instead." (since := "2025-04-10")] structure LinearOrderedCommGroup (α : Type u) extends OrderedCommGroup α, LinearOrder α attribute [nolint docBlame] LinearOrderedCommGroup.toLinearOrder LinearOrderedAddCommGroup.toLinearOrder section LinearOrderedCommGroup variable [CommGroup α] [LinearOrder α] [IsOrderedMonoid α] {a : α} @[to_additive LinearOrderedAddCommGroup.add_lt_add_left] theorem LinearOrderedCommGroup.mul_lt_mul_left' (a b : α) (h : a < b) (c : α) : c * a < c * b := _root_.mul_lt_mul_left' h c	@[to_additive eq_zero_of_neg_eq] theorem eq_one_of_inv_eq' (h : a⁻¹ = a) : a = 1 := match lt_trichotomy a 1 with	Mathlib/Algebra/Order/Group/Defs.lean	106	108
/- 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.Data.Set.Constructions import Mathlib.Order.Filter.AtTopBot.CountablyGenerated import Mathlib.Topology.Constructions import Mathlib.Topology.ContinuousOn /-! # Bases of topologies. Countability axioms. A topological basis on a topological space `t` is a collection of sets, such that all open sets can be generated as unions of these sets, without the need to take finite intersections of them. This file introduces a framework for dealing with these collections, and also what more we can say under certain countability conditions on bases, which are referred to as first- and second-countable. We also briefly cover the theory of separable spaces, which are those with a countable, dense subset. If a space is second-countable, and also has a countably generated uniformity filter (for example, if `t` is a metric space), it will automatically be separable (and indeed, these conditions are equivalent in this case). ## Main definitions * `TopologicalSpace.IsTopologicalBasis s`: The topological space `t` has basis `s`. * `TopologicalSpace.SeparableSpace α`: The topological space `t` has a countable, dense subset. * `TopologicalSpace.IsSeparable s`: The set `s` is contained in the closure of a countable set. * `FirstCountableTopology α`: A topology in which `𝓝 x` is countably generated for every `x`. * `SecondCountableTopology α`: A topology which has a topological basis which is countable. ## Main results * `TopologicalSpace.FirstCountableTopology.tendsto_subseq`: In a first-countable space, cluster points are limits of subsequences. * `TopologicalSpace.SecondCountableTopology.isOpen_iUnion_countable`: In a second-countable space, the union of arbitrarily-many open sets is equal to a sub-union of only countably many of these sets. * `TopologicalSpace.SecondCountableTopology.countable_cover_nhds`: Consider `f : α → Set α` with the property that `f x ∈ 𝓝 x` for all `x`. Then there is some countable set `s` whose image covers the space. ## Implementation Notes For our applications we are interested that there exists a countable basis, but we do not need the concrete basis itself. This allows us to declare these type classes as `Prop` to use them as mixins. ## TODO More fine grained instances for `FirstCountableTopology`, `TopologicalSpace.SeparableSpace`, and more. -/ open Set Filter Function Topology noncomputable section namespace TopologicalSpace universe u variable {α : Type u} {β : Type} [t : TopologicalSpace α] {B : Set (Set α)} {s : Set α} /-- A topological basis is one that satisfies the necessary conditions so that it suffices to take unions of the basis sets to get a topology (without taking finite intersections as well). -/ structure IsTopologicalBasis (s : Set (Set α)) : Prop where /-- For every point `x`, the set of `t ∈ s` such that `x ∈ t` is directed downwards. -/ exists_subset_inter : ∀ t₁ ∈ s, ∀ t₂ ∈ s, ∀ x ∈ t₁ ∩ t₂, ∃ t₃ ∈ s, x ∈ t₃ ∧ t₃ ⊆ t₁ ∩ t₂ /-- The sets from `s` cover the whole space. -/ sUnion_eq : ⋃₀ s = univ /-- The topology is generated by sets from `s`. -/ eq_generateFrom : t = generateFrom s /-- If a family of sets `s` generates the topology, then intersections of finite subcollections of `s` form a topological basis. -/ theorem isTopologicalBasis_of_subbasis {s : Set (Set α)} (hs : t = generateFrom s) : IsTopologicalBasis ((fun f => ⋂₀ f) '' { f : Set (Set α) \| f.Finite ∧ f ⊆ s }) := by subst t; letI := generateFrom s refine ⟨?_, ?_, le_antisymm (le_generateFrom ?_) <\| generateFrom_anti fun t ht => ?_⟩ · rintro _ ⟨t₁, ⟨hft₁, ht₁b⟩, rfl⟩ _ ⟨t₂, ⟨hft₂, ht₂b⟩, rfl⟩ x h exact ⟨_, ⟨_, ⟨hft₁.union hft₂, union_subset ht₁b ht₂b⟩, sInter_union t₁ t₂⟩, h, Subset.rfl⟩ · rw [sUnion_image, iUnion₂_eq_univ_iff] exact fun x => ⟨∅, ⟨finite_empty, empty_subset _⟩, sInter_empty.substr <\| mem_univ x⟩ · rintro _ ⟨t, ⟨hft, htb⟩, rfl⟩ exact hft.isOpen_sInter fun s hs ↦ GenerateOpen.basic _ <\| htb hs · rw [← sInter_singleton t] exact ⟨{t}, ⟨finite_singleton t, singleton_subset_iff.2 ht⟩, rfl⟩ theorem isTopologicalBasis_of_subbasis_of_finiteInter {s : Set (Set α)} (hsg : t = generateFrom s) (hsi : FiniteInter s) : IsTopologicalBasis s := by convert isTopologicalBasis_of_subbasis hsg refine le_antisymm (fun t ht ↦ ⟨{t}, by simpa using ht⟩) ?_ rintro _ ⟨g, ⟨hg, hgs⟩, rfl⟩ lift g to Finset (Set α) using hg exact hsi.finiteInter_mem g hgs theorem isTopologicalBasis_of_subbasis_of_inter {r : Set (Set α)} (hsg : t = generateFrom r) (hsi : ∀ ⦃s⦄, s ∈ r → ∀ ⦃t⦄, t ∈ r → s ∩ t ∈ r) : IsTopologicalBasis (insert univ r) := isTopologicalBasis_of_subbasis_of_finiteInter (by simpa using hsg) (FiniteInter.mk₂ hsi) theorem IsTopologicalBasis.of_hasBasis_nhds {s : Set (Set α)} (h_nhds : ∀ a, (𝓝 a).HasBasis (fun t ↦ t ∈ s ∧ a ∈ t) id) : IsTopologicalBasis s where exists_subset_inter t₁ ht₁ t₂ ht₂ x hx := by simpa only [and_assoc, (h_nhds x).mem_iff] using (inter_mem ((h_nhds _).mem_of_mem ⟨ht₁, hx.1⟩) ((h_nhds _).mem_of_mem ⟨ht₂, hx.2⟩)) sUnion_eq := sUnion_eq_univ_iff.2 fun x ↦ (h_nhds x).ex_mem eq_generateFrom := ext_nhds fun x ↦ by simpa only [nhds_generateFrom, and_comm] using (h_nhds x).eq_biInf /-- If a family of open sets `s` is such that every open neighbourhood contains some member of `s`, then `s` is a topological basis. -/ theorem isTopologicalBasis_of_isOpen_of_nhds {s : Set (Set α)} (h_open : ∀ u ∈ s, IsOpen u) (h_nhds : ∀ (a : α) (u : Set α), a ∈ u → IsOpen u → ∃ v ∈ s, a ∈ v ∧ v ⊆ u) : IsTopologicalBasis s := .of_hasBasis_nhds <\| fun a ↦ (nhds_basis_opens a).to_hasBasis' (by simpa [and_assoc] using h_nhds a) fun _ ⟨hts, hat⟩ ↦ (h_open _ hts).mem_nhds hat /-- A set `s` is in the neighbourhood of `a` iff there is some basis set `t`, which contains `a` and is itself contained in `s`. -/ theorem IsTopologicalBasis.mem_nhds_iff {a : α} {s : Set α} {b : Set (Set α)} (hb : IsTopologicalBasis b) : s ∈ 𝓝 a ↔ ∃ t ∈ b, a ∈ t ∧ t ⊆ s := by change s ∈ (𝓝 a).sets ↔ ∃ t ∈ b, a ∈ t ∧ t ⊆ s rw [hb.eq_generateFrom, nhds_generateFrom, biInf_sets_eq] · simp [and_assoc, and_left_comm] · rintro s ⟨hs₁, hs₂⟩ t ⟨ht₁, ht₂⟩ let ⟨u, hu₁, hu₂, hu₃⟩ := hb.1 _ hs₂ _ ht₂ _ ⟨hs₁, ht₁⟩ exact ⟨u, ⟨hu₂, hu₁⟩, le_principal_iff.2 (hu₃.trans inter_subset_left), le_principal_iff.2 (hu₃.trans inter_subset_right)⟩ · rcases eq_univ_iff_forall.1 hb.sUnion_eq a with ⟨i, h1, h2⟩ exact ⟨i, h2, h1⟩ theorem IsTopologicalBasis.isOpen_iff {s : Set α} {b : Set (Set α)} (hb : IsTopologicalBasis b) : IsOpen s ↔ ∀ a ∈ s, ∃ t ∈ b, a ∈ t ∧ t ⊆ s := by simp [isOpen_iff_mem_nhds, hb.mem_nhds_iff] theorem IsTopologicalBasis.of_isOpen_of_subset {s s' : Set (Set α)} (h_open : ∀ u ∈ s', IsOpen u) (hs : IsTopologicalBasis s) (hss' : s ⊆ s') : IsTopologicalBasis s' := isTopologicalBasis_of_isOpen_of_nhds h_open fun a _ ha u_open ↦ have ⟨t, hts, ht⟩ := hs.isOpen_iff.mp u_open a ha; ⟨t, hss' hts, ht⟩ theorem IsTopologicalBasis.nhds_hasBasis {b : Set (Set α)} (hb : IsTopologicalBasis b) {a : α} : (𝓝 a).HasBasis (fun t : Set α => t ∈ b ∧ a ∈ t) fun t => t := ⟨fun s => hb.mem_nhds_iff.trans <\| by simp only [and_assoc]⟩ protected theorem IsTopologicalBasis.isOpen {s : Set α} {b : Set (Set α)} (hb : IsTopologicalBasis b) (hs : s ∈ b) : IsOpen s := by rw [hb.eq_generateFrom] exact .basic s hs theorem IsTopologicalBasis.insert_empty {s : Set (Set α)} (h : IsTopologicalBasis s) : IsTopologicalBasis (insert ∅ s) := h.of_isOpen_of_subset (by rintro _ (rfl \| hu); exacts [isOpen_empty, h.isOpen hu]) (subset_insert ..) theorem IsTopologicalBasis.diff_empty {s : Set (Set α)} (h : IsTopologicalBasis s) : IsTopologicalBasis (s \ {∅}) := isTopologicalBasis_of_isOpen_of_nhds (fun _ hu ↦ h.isOpen hu.1) fun a _ ha hu ↦ have ⟨t, hts, ht⟩ := h.isOpen_iff.mp hu a ha ⟨t, ⟨hts, ne_of_mem_of_not_mem' ht.1 <\| not_mem_empty _⟩, ht⟩ protected theorem IsTopologicalBasis.mem_nhds {a : α} {s : Set α} {b : Set (Set α)} (hb : IsTopologicalBasis b) (hs : s ∈ b) (ha : a ∈ s) : s ∈ 𝓝 a := (hb.isOpen hs).mem_nhds ha theorem IsTopologicalBasis.exists_subset_of_mem_open {b : Set (Set α)} (hb : IsTopologicalBasis b) {a : α} {u : Set α} (au : a ∈ u) (ou : IsOpen u) : ∃ v ∈ b, a ∈ v ∧ v ⊆ u := hb.mem_nhds_iff.1 <\| IsOpen.mem_nhds ou au /-- Any open set is the union of the basis sets contained in it. -/ theorem IsTopologicalBasis.open_eq_sUnion' {B : Set (Set α)} (hB : IsTopologicalBasis B) {u : Set α} (ou : IsOpen u) : u = ⋃₀ { s ∈ B \| s ⊆ u } := ext fun _a => ⟨fun ha => let ⟨b, hb, ab, bu⟩ := hB.exists_subset_of_mem_open ha ou ⟨b, ⟨hb, bu⟩, ab⟩, fun ⟨_b, ⟨_, bu⟩, ab⟩ => bu ab⟩ theorem IsTopologicalBasis.open_eq_sUnion {B : Set (Set α)} (hB : IsTopologicalBasis B) {u : Set α} (ou : IsOpen u) : ∃ S ⊆ B, u = ⋃₀ S := ⟨{ s ∈ B \| s ⊆ u }, fun _ h => h.1, hB.open_eq_sUnion' ou⟩ theorem IsTopologicalBasis.open_iff_eq_sUnion {B : Set (Set α)} (hB : IsTopologicalBasis B) {u : Set α} : IsOpen u ↔ ∃ S ⊆ B, u = ⋃₀ S := ⟨hB.open_eq_sUnion, fun ⟨_S, hSB, hu⟩ => hu.symm ▸ isOpen_sUnion fun _s hs => hB.isOpen (hSB hs)⟩ theorem IsTopologicalBasis.open_eq_iUnion {B : Set (Set α)} (hB : IsTopologicalBasis B) {u : Set α} (ou : IsOpen u) : ∃ (β : Type u) (f : β → Set α), (u = ⋃ i, f i) ∧ ∀ i, f i ∈ B := ⟨↥({ s ∈ B \| s ⊆ u }), (↑), by rw [← sUnion_eq_iUnion] apply hB.open_eq_sUnion' ou, fun s => And.left s.2⟩ lemma IsTopologicalBasis.subset_of_forall_subset {t : Set α} (hB : IsTopologicalBasis B) (hs : IsOpen s) (h : ∀ U ∈ B, U ⊆ s → U ⊆ t) : s ⊆ t := by rw [hB.open_eq_sUnion' hs]; simpa [sUnion_subset_iff] lemma IsTopologicalBasis.eq_of_forall_subset_iff {t : Set α} (hB : IsTopologicalBasis B) (hs : IsOpen s) (ht : IsOpen t) (h : ∀ U ∈ B, U ⊆ s ↔ U ⊆ t) : s = t := by rw [hB.open_eq_sUnion' hs, hB.open_eq_sUnion' ht] exact congr_arg _ (Set.ext fun U ↦ and_congr_right <\| h _) /-- A point `a` is in the closure of `s` iff all basis sets containing `a` intersect `s`. -/ theorem IsTopologicalBasis.mem_closure_iff {b : Set (Set α)} (hb : IsTopologicalBasis b) {s : Set α} {a : α} : a ∈ closure s ↔ ∀ o ∈ b, a ∈ o → (o ∩ s).Nonempty := (mem_closure_iff_nhds_basis' hb.nhds_hasBasis).trans <\| by simp only [and_imp] /-- A set is dense iff it has non-trivial intersection with all basis sets. -/ theorem IsTopologicalBasis.dense_iff {b : Set (Set α)} (hb : IsTopologicalBasis b) {s : Set α} : Dense s ↔ ∀ o ∈ b, Set.Nonempty o → (o ∩ s).Nonempty := by simp only [Dense, hb.mem_closure_iff] exact ⟨fun h o hb ⟨a, ha⟩ => h a o hb ha, fun h a o hb ha => h o hb ⟨a, ha⟩⟩ theorem IsTopologicalBasis.isOpenMap_iff {β} [TopologicalSpace β] {B : Set (Set α)} (hB : IsTopologicalBasis B) {f : α → β} : IsOpenMap f ↔ ∀ s ∈ B, IsOpen (f '' s) := by refine ⟨fun H o ho => H _ (hB.isOpen ho), fun hf o ho => ?_⟩ rw [hB.open_eq_sUnion' ho, sUnion_eq_iUnion, image_iUnion] exact isOpen_iUnion fun s => hf s s.2.1 theorem IsTopologicalBasis.exists_nonempty_subset {B : Set (Set α)} (hb : IsTopologicalBasis B) {u : Set α} (hu : u.Nonempty) (ou : IsOpen u) : ∃ v ∈ B, Set.Nonempty v ∧ v ⊆ u := let ⟨x, hx⟩ := hu let ⟨v, vB, xv, vu⟩ := hb.exists_subset_of_mem_open hx ou ⟨v, vB, ⟨x, xv⟩, vu⟩ theorem isTopologicalBasis_opens : IsTopologicalBasis { U : Set α \| IsOpen U } := isTopologicalBasis_of_isOpen_of_nhds (by tauto) (by tauto) protected lemma IsTopologicalBasis.isInducing {β} [TopologicalSpace β] {f : α → β} {T : Set (Set β)} (hf : IsInducing f) (h : IsTopologicalBasis T) : IsTopologicalBasis ((preimage f) '' T) := .of_hasBasis_nhds fun a ↦ by convert (hf.basis_nhds (h.nhds_hasBasis (a := f a))).to_image_id with s aesop @[deprecated (since := "2024-10-28")] alias IsTopologicalBasis.inducing := IsTopologicalBasis.isInducing protected theorem IsTopologicalBasis.induced {α} [s : TopologicalSpace β] (f : α → β) {T : Set (Set β)} (h : IsTopologicalBasis T) : IsTopologicalBasis (t := induced f s) ((preimage f) '' T) := h.isInducing (t := induced f s) (.induced f) protected theorem IsTopologicalBasis.inf {t₁ t₂ : TopologicalSpace β} {B₁ B₂ : Set (Set β)} (h₁ : IsTopologicalBasis (t := t₁) B₁) (h₂ : IsTopologicalBasis (t := t₂) B₂) : IsTopologicalBasis (t := t₁ ⊓ t₂) (image2 (· ∩ ·) B₁ B₂) := by refine .of_hasBasis_nhds (t := ?_) fun a ↦ ?_ rw [nhds_inf (t₁ := t₁)] convert ((h₁.nhds_hasBasis (t := t₁)).inf (h₂.nhds_hasBasis (t := t₂))).to_image_id aesop theorem IsTopologicalBasis.inf_induced {γ} [s : TopologicalSpace β] {B₁ : Set (Set α)} {B₂ : Set (Set β)} (h₁ : IsTopologicalBasis B₁) (h₂ : IsTopologicalBasis B₂) (f₁ : γ → α) (f₂ : γ → β) : IsTopologicalBasis (t := induced f₁ t ⊓ induced f₂ s) (image2 (f₁ ⁻¹' · ∩ f₂ ⁻¹' ·) B₁ B₂) := by simpa only [image2_image_left, image2_image_right] using (h₁.induced f₁).inf (h₂.induced f₂) protected theorem IsTopologicalBasis.prod {β} [TopologicalSpace β] {B₁ : Set (Set α)} {B₂ : Set (Set β)} (h₁ : IsTopologicalBasis B₁) (h₂ : IsTopologicalBasis B₂) : IsTopologicalBasis (image2 (· ×ˢ ·) B₁ B₂) := h₁.inf_induced h₂ Prod.fst Prod.snd theorem isTopologicalBasis_of_cover {ι} {U : ι → Set α} (Uo : ∀ i, IsOpen (U i)) (Uc : ⋃ i, U i = univ) {b : ∀ i, Set (Set (U i))} (hb : ∀ i, IsTopologicalBasis (b i)) : IsTopologicalBasis (⋃ i : ι, image ((↑) : U i → α) '' b i) := by refine isTopologicalBasis_of_isOpen_of_nhds (fun u hu => ?_) ?_ · simp only [mem_iUnion, mem_image] at hu rcases hu with ⟨i, s, sb, rfl⟩ exact (Uo i).isOpenMap_subtype_val _ ((hb i).isOpen sb) · intro a u ha uo rcases iUnion_eq_univ_iff.1 Uc a with ⟨i, hi⟩ lift a to ↥(U i) using hi rcases (hb i).exists_subset_of_mem_open ha (uo.preimage continuous_subtype_val) with ⟨v, hvb, hav, hvu⟩ exact ⟨(↑) '' v, mem_iUnion.2 ⟨i, mem_image_of_mem _ hvb⟩, mem_image_of_mem _ hav, image_subset_iff.2 hvu⟩ protected theorem IsTopologicalBasis.continuous_iff {β : Type} [TopologicalSpace β] {B : Set (Set β)} (hB : IsTopologicalBasis B) {f : α → β} : Continuous f ↔ ∀ s ∈ B, IsOpen (f ⁻¹' s) := by rw [hB.eq_generateFrom, continuous_generateFrom_iff] @[simp] lemma isTopologicalBasis_empty : IsTopologicalBasis (∅ : Set (Set α)) ↔ IsEmpty α where mp h := by simpa using h.sUnion_eq.symm mpr h := ⟨by simp, by simp [Set.univ_eq_empty_iff.2], Subsingleton.elim ..⟩ variable (α) /-- A separable space is one with a countable dense subset, available through `TopologicalSpace.exists_countable_dense`. If `α` is also known to be nonempty, then `TopologicalSpace.denseSeq` provides a sequence `ℕ → α` with dense range, see `TopologicalSpace.denseRange_denseSeq`. If `α` is a uniform space with countably generated uniformity filter (e.g., an `EMetricSpace`), then this condition is equivalent to `SecondCountableTopology α`. In this case the latter should be used as a typeclass argument in theorems because Lean can automatically deduce `TopologicalSpace.SeparableSpace` from `SecondCountableTopology` but it can't deduce `SecondCountableTopology` from `TopologicalSpace.SeparableSpace`. Porting note (https://github.com/leanprover-community/mathlib4/issues/11215): TODO: the previous paragraph describes the state of the art in Lean 3. We can have instance cycles in Lean 4 but we might want to postpone adding them till after the port. -/ @[mk_iff] class SeparableSpace : Prop where /-- There exists a countable dense set. -/ exists_countable_dense : ∃ s : Set α, s.Countable ∧ Dense s theorem exists_countable_dense [SeparableSpace α] : ∃ s : Set α, s.Countable ∧ Dense s := SeparableSpace.exists_countable_dense /-- A nonempty separable space admits a sequence with dense range. Instead of running `cases` on the conclusion of this lemma, you might want to use `TopologicalSpace.denseSeq` and `TopologicalSpace.denseRange_denseSeq`. If `α` might be empty, then `TopologicalSpace.exists_countable_dense` is the main way to use separability of `α`. -/ theorem exists_dense_seq [SeparableSpace α] [Nonempty α] : ∃ u : ℕ → α, DenseRange u := by obtain ⟨s : Set α, hs, s_dense⟩ := exists_countable_dense α obtain ⟨u, hu⟩ := Set.countable_iff_exists_subset_range.mp hs exact ⟨u, s_dense.mono hu⟩ /-- A dense sequence in a non-empty separable topological space. If `α` might be empty, then `TopologicalSpace.exists_countable_dense` is the main way to use separability of `α`. -/ def denseSeq [SeparableSpace α] [Nonempty α] : ℕ → α := Classical.choose (exists_dense_seq α) /-- The sequence `TopologicalSpace.denseSeq α` has dense range. -/ @[simp] theorem denseRange_denseSeq [SeparableSpace α] [Nonempty α] : DenseRange (denseSeq α) := Classical.choose_spec (exists_dense_seq α) variable {α} instance (priority := 100) Countable.to_separableSpace [Countable α] : SeparableSpace α where exists_countable_dense := ⟨Set.univ, Set.countable_univ, dense_univ⟩ /-- If `f` has a dense range and its domain is countable, then its codomain is a separable space. See also `DenseRange.separableSpace`. -/ theorem SeparableSpace.of_denseRange {ι : Sort _} [Countable ι] (u : ι → α) (hu : DenseRange u) : SeparableSpace α := ⟨⟨range u, countable_range u, hu⟩⟩ alias _root_.DenseRange.separableSpace' := SeparableSpace.of_denseRange /-- If `α` is a separable space and `f : α → β` is a continuous map with dense range, then `β` is a separable space as well. E.g., the completion of a separable uniform space is separable. -/ protected theorem _root_.DenseRange.separableSpace [SeparableSpace α] [TopologicalSpace β] {f : α → β} (h : DenseRange f) (h' : Continuous f) : SeparableSpace β := let ⟨s, s_cnt, s_dense⟩ := exists_countable_dense α ⟨⟨f '' s, Countable.image s_cnt f, h.dense_image h' s_dense⟩⟩ theorem _root_.Topology.IsQuotientMap.separableSpace [SeparableSpace α] [TopologicalSpace β] {f : α → β} (hf : IsQuotientMap f) : SeparableSpace β := hf.surjective.denseRange.separableSpace hf.continuous @[deprecated (since := "2024-10-22")] alias _root_.QuotientMap.separableSpace := Topology.IsQuotientMap.separableSpace /-- The product of two separable spaces is a separable space. -/ instance [TopologicalSpace β] [SeparableSpace α] [SeparableSpace β] : SeparableSpace (α × β) := by rcases exists_countable_dense α with ⟨s, hsc, hsd⟩ rcases exists_countable_dense β with ⟨t, htc, htd⟩ exact ⟨⟨s ×ˢ t, hsc.prod htc, hsd.prod htd⟩⟩ /-- The product of a countable family of separable spaces is a separable space. -/ instance {ι : Type} {X : ι → Type} [∀ i, TopologicalSpace (X i)] [∀ i, SeparableSpace (X i)] [Countable ι] : SeparableSpace (∀ i, X i) := by choose t htc htd using (exists_countable_dense <\| X ·) haveI := fun i ↦ (htc i).to_subtype nontriviality ∀ i, X i; inhabit ∀ i, X i classical set f : (Σ I : Finset ι, ∀ i : I, t i) → ∀ i, X i := fun ⟨I, g⟩ i ↦ if hi : i ∈ I then g ⟨i, hi⟩ else (default : ∀ i, X i) i refine ⟨⟨range f, countable_range f, dense_iff_inter_open.2 fun U hU ⟨g, hg⟩ ↦ ?_⟩⟩ rcases isOpen_pi_iff.1 hU g hg with ⟨I, u, huo, huU⟩ have : ∀ i : I, ∃ y ∈ t i, y ∈ u i := fun i ↦ (htd i).exists_mem_open (huo i i.2).1 ⟨_, (huo i i.2).2⟩ choose y hyt hyu using this lift y to ∀ i : I, t i using hyt refine ⟨f ⟨I, y⟩, huU fun i (hi : i ∈ I) ↦ ?_, mem_range_self (f := f) ⟨I, y⟩⟩ simp only [f, dif_pos hi] exact hyu ⟨i, _⟩ instance [SeparableSpace α] {r : α → α → Prop} : SeparableSpace (Quot r) := isQuotientMap_quot_mk.separableSpace instance [SeparableSpace α] {s : Setoid α} : SeparableSpace (Quotient s) := isQuotientMap_quot_mk.separableSpace /-- A topological space with discrete topology is separable iff it is countable. -/ theorem separableSpace_iff_countable [DiscreteTopology α] : SeparableSpace α ↔ Countable α := by simp [separableSpace_iff, countable_univ_iff] /-- In a separable space, a family of nonempty disjoint open sets is countable. -/ theorem _root_.Pairwise.countable_of_isOpen_disjoint [SeparableSpace α] {ι : Type} {s : ι → Set α} (hd : Pairwise (Disjoint on s)) (ho : ∀ i, IsOpen (s i)) (hne : ∀ i, (s i).Nonempty) : Countable ι := by rcases exists_countable_dense α with ⟨u, u_countable, u_dense⟩ choose f hfu hfs using fun i ↦ u_dense.exists_mem_open (ho i) (hne i) have f_inj : Injective f := fun i j hij ↦ hd.eq <\| not_disjoint_iff.2 ⟨f i, hfs i, hij.symm ▸ hfs j⟩ have := u_countable.to_subtype exact (f_inj.codRestrict hfu).countable /-- In a separable space, a family of nonempty disjoint open sets is countable. -/ theorem _root_.Set.PairwiseDisjoint.countable_of_isOpen [SeparableSpace α] {ι : Type} {s : ι → Set α} {a : Set ι} (h : a.PairwiseDisjoint s) (ho : ∀ i ∈ a, IsOpen (s i)) (hne : ∀ i ∈ a, (s i).Nonempty) : a.Countable := (h.subtype _ _).countable_of_isOpen_disjoint (Subtype.forall.2 ho) (Subtype.forall.2 hne) /-- In a separable space, a family of disjoint sets with nonempty interiors is countable. -/ theorem _root_.Set.PairwiseDisjoint.countable_of_nonempty_interior [SeparableSpace α] {ι : Type} {s : ι → Set α} {a : Set ι} (h : a.PairwiseDisjoint s) (ha : ∀ i ∈ a, (interior (s i)).Nonempty) : a.Countable := (h.mono fun _ => interior_subset).countable_of_isOpen (fun _ _ => isOpen_interior) ha /-- A set `s` in a topological space is separable if it is contained in the closure of a countable set `c`. Beware that this definition does not require that `c` is contained in `s` (to express the latter, use `TopologicalSpace.SeparableSpace s` or `TopologicalSpace.IsSeparable (univ : Set s))`. In metric spaces, the two definitions are equivalent, see `TopologicalSpace.IsSeparable.separableSpace`. -/ def IsSeparable (s : Set α) := ∃ c : Set α, c.Countable ∧ s ⊆ closure c theorem IsSeparable.mono {s u : Set α} (hs : IsSeparable s) (hu : u ⊆ s) : IsSeparable u := by rcases hs with ⟨c, c_count, hs⟩ exact ⟨c, c_count, hu.trans hs⟩ theorem IsSeparable.iUnion {ι : Sort} [Countable ι] {s : ι → Set α} (hs : ∀ i, IsSeparable (s i)) : IsSeparable (⋃ i, s i) := by choose c hc h'c using hs refine ⟨⋃ i, c i, countable_iUnion hc, iUnion_subset_iff.2 fun i => ?_⟩ exact (h'c i).trans (closure_mono (subset_iUnion _ i)) @[simp] theorem isSeparable_iUnion {ι : Sort} [Countable ι] {s : ι → Set α} : IsSeparable (⋃ i, s i) ↔ ∀ i, IsSeparable (s i) := ⟨fun h i ↦ h.mono <\| subset_iUnion s i, .iUnion⟩ @[simp] theorem isSeparable_union {s t : Set α} : IsSeparable (s ∪ t) ↔ IsSeparable s ∧ IsSeparable t := by simp [union_eq_iUnion, and_comm] theorem IsSeparable.union {s u : Set α} (hs : IsSeparable s) (hu : IsSeparable u) : IsSeparable (s ∪ u) := isSeparable_union.2 ⟨hs, hu⟩ @[simp] theorem isSeparable_closure : IsSeparable (closure s) ↔ IsSeparable s := by simp only [IsSeparable, isClosed_closure.closure_subset_iff] protected alias ⟨_, IsSeparable.closure⟩ := isSeparable_closure theorem _root_.Set.Countable.isSeparable {s : Set α} (hs : s.Countable) : IsSeparable s := ⟨s, hs, subset_closure⟩ theorem _root_.Set.Finite.isSeparable {s : Set α} (hs : s.Finite) : IsSeparable s := hs.countable.isSeparable theorem IsSeparable.univ_pi {ι : Type} [Countable ι] {X : ι → Type} {s : ∀ i, Set (X i)} [∀ i, TopologicalSpace (X i)] (h : ∀ i, IsSeparable (s i)) : IsSeparable (univ.pi s) := by classical rcases eq_empty_or_nonempty (univ.pi s) with he \| ⟨f₀, -⟩ · rw [he] exact countable_empty.isSeparable · choose c c_count hc using h haveI := fun i ↦ (c_count i).to_subtype set g : (I : Finset ι) × ((i : I) → c i) → (i : ι) → X i := fun ⟨I, f⟩ i ↦ if hi : i ∈ I then f ⟨i, hi⟩ else f₀ i refine ⟨range g, countable_range g, fun f hf ↦ mem_closure_iff.2 fun o ho hfo ↦ ?_⟩ rcases isOpen_pi_iff.1 ho f hfo with ⟨I, u, huo, hI⟩ rsuffices ⟨f, hf⟩ : ∃ f : (i : I) → c i, g ⟨I, f⟩ ∈ Set.pi I u · exact ⟨g ⟨I, f⟩, hI hf, mem_range_self (f := g) ⟨I, f⟩⟩ suffices H : ∀ i ∈ I, (u i ∩ c i).Nonempty by choose f hfu hfc using H refine ⟨fun i ↦ ⟨f i i.2, hfc i i.2⟩, fun i (hi : i ∈ I) ↦ ?_⟩ simpa only [g, dif_pos hi] using hfu i hi intro i hi exact mem_closure_iff.1 (hc i <\| hf _ trivial) _ (huo i hi).1 (huo i hi).2 lemma isSeparable_pi {ι : Type} [Countable ι] {α : ι → Type} {s : ∀ i, Set (α i)} [∀ i, TopologicalSpace (α i)] (h : ∀ i, IsSeparable (s i)) : IsSeparable {f : ∀ i, α i \| ∀ i, f i ∈ s i} := by simpa only [← mem_univ_pi] using IsSeparable.univ_pi h lemma IsSeparable.prod {β : Type} [TopologicalSpace β] {s : Set α} {t : Set β} (hs : IsSeparable s) (ht : IsSeparable t) : IsSeparable (s ×ˢ t) := by rcases hs with ⟨cs, cs_count, hcs⟩ rcases ht with ⟨ct, ct_count, hct⟩ refine ⟨cs ×ˢ ct, cs_count.prod ct_count, ?_⟩ rw [closure_prod_eq] gcongr theorem IsSeparable.image {β : Type} [TopologicalSpace β] {s : Set α} (hs : IsSeparable s) {f : α → β} (hf : Continuous f) : IsSeparable (f '' s) := by rcases hs with ⟨c, c_count, hc⟩ refine ⟨f '' c, c_count.image _, ?_⟩ rw [image_subset_iff] exact hc.trans (closure_subset_preimage_closure_image hf) theorem _root_.Dense.isSeparable_iff (hs : Dense s) : IsSeparable s ↔ SeparableSpace α := by simp_rw [IsSeparable, separableSpace_iff, dense_iff_closure_eq, ← univ_subset_iff, ← hs.closure_eq, isClosed_closure.closure_subset_iff] theorem isSeparable_univ_iff : IsSeparable (univ : Set α) ↔ SeparableSpace α := dense_univ.isSeparable_iff theorem isSeparable_range [TopologicalSpace β] [SeparableSpace α] {f : α → β} (hf : Continuous f) : IsSeparable (range f) := image_univ (f := f) ▸ (isSeparable_univ_iff.2 ‹_›).image hf theorem IsSeparable.of_subtype (s : Set α) [SeparableSpace s] : IsSeparable s := by simpa using isSeparable_range (continuous_subtype_val (p := (· ∈ s))) theorem IsSeparable.of_separableSpace [h : SeparableSpace α] (s : Set α) : IsSeparable s := IsSeparable.mono (isSeparable_univ_iff.2 h) (subset_univ _) end TopologicalSpace open TopologicalSpace protected theorem IsTopologicalBasis.iInf {β : Type} {ι : Type} {t : ι → TopologicalSpace β} {T : ι → Set (Set β)} (h_basis : ∀ i, IsTopologicalBasis (t := t i) (T i)) : IsTopologicalBasis (t := ⨅ i, t i) { S \| ∃ (U : ι → Set β) (F : Finset ι), (∀ i, i ∈ F → U i ∈ T i) ∧ S = ⋂ i ∈ F, U i } := by let _ := ⨅ i, t i refine isTopologicalBasis_of_isOpen_of_nhds ?_ ?_ · rintro - ⟨U, F, hU, rfl⟩ refine isOpen_biInter_finset fun i hi ↦ (h_basis i).isOpen (t := t i) (hU i hi) \|>.mono (iInf_le _ _) · intro a u ha hu rcases (nhds_iInf (t := t) (a := a)).symm ▸ hasBasis_iInf' (fun i ↦ (h_basis i).nhds_hasBasis (t := t i)) \|>.mem_iff.1 (hu.mem_nhds ha) with ⟨⟨F, U⟩, ⟨hF, hU⟩, hUu⟩ refine ⟨_, ⟨U, hF.toFinset, ?_, rfl⟩, ?_, ?_⟩ <;> simp only [Finite.mem_toFinset, mem_iInter] · exact fun i hi ↦ (hU i hi).1 · exact fun i hi ↦ (hU i hi).2 · exact hUu theorem IsTopologicalBasis.iInf_induced {β : Type} {ι : Type} {X : ι → Type} [t : Π i, TopologicalSpace (X i)] {T : Π i, Set (Set (X i))} (cond : ∀ i, IsTopologicalBasis (T i)) (f : Π i, β → X i) : IsTopologicalBasis (t := ⨅ i, induced (f i) (t i)) { S \| ∃ (U : ∀ i, Set (X i)) (F : Finset ι), (∀ i, i ∈ F → U i ∈ T i) ∧ S = ⋂ (i) (_ : i ∈ F), f i ⁻¹' U i } := by convert IsTopologicalBasis.iInf (fun i ↦ (cond i).induced (f i)) with S constructor <;> rintro ⟨U, F, hUT, hSU⟩ · exact ⟨fun i ↦ (f i) ⁻¹' (U i), F, fun i hi ↦ mem_image_of_mem _ (hUT i hi), hSU⟩ · choose! U' hU' hUU' using hUT exact ⟨U', F, hU', hSU ▸ (.symm <\| iInter₂_congr hUU')⟩ theorem isTopologicalBasis_pi {ι : Type} {X : ι → Type} [∀ i, TopologicalSpace (X i)] {T : ∀ i, Set (Set (X i))} (cond : ∀ i, IsTopologicalBasis (T i)) : IsTopologicalBasis { S \| ∃ (U : ∀ i, Set (X i)) (F : Finset ι), (∀ i, i ∈ F → U i ∈ T i) ∧ S = (F : Set ι).pi U } := by simpa only [Set.pi_def] using IsTopologicalBasis.iInf_induced cond eval theorem isTopologicalBasis_singletons (α : Type) [TopologicalSpace α] [DiscreteTopology α] : IsTopologicalBasis { s \| ∃ x : α, (s : Set α) = {x} } := isTopologicalBasis_of_isOpen_of_nhds (fun _ _ => isOpen_discrete _) fun x _ hx _ => ⟨{x}, ⟨x, rfl⟩, mem_singleton x, singleton_subset_iff.2 hx⟩ theorem isTopologicalBasis_subtype {α : Type} [TopologicalSpace α] {B : Set (Set α)} (h : TopologicalSpace.IsTopologicalBasis B) (p : α → Prop) : IsTopologicalBasis (Set.preimage (Subtype.val (p := p)) '' B) := h.isInducing ⟨rfl⟩ section variable {ι : Type} {π : ι → Type} [∀ i, TopologicalSpace (π i)] lemma isOpenMap_eval (i : ι) : IsOpenMap (Function.eval i : (∀ i, π i) → π i) := by classical refine (isTopologicalBasis_pi fun _ ↦ isTopologicalBasis_opens).isOpenMap_iff.2 ?_ rintro _ ⟨U, s, hU, rfl⟩ obtain h \| h := ((s : Set ι).pi U).eq_empty_or_nonempty · simp [h] by_cases hi : i ∈ s · rw [eval_image_pi (mod_cast hi) h] exact hU _ hi · rw [eval_image_pi_of_not_mem (mod_cast hi), if_pos h] exact isOpen_univ end theorem Dense.exists_countable_dense_subset {α : Type} [TopologicalSpace α] {s : Set α} [SeparableSpace s] (hs : Dense s) : ∃ t ⊆ s, t.Countable ∧ Dense t := let ⟨t, htc, htd⟩ := exists_countable_dense s ⟨(↑) '' t, Subtype.coe_image_subset s t, htc.image Subtype.val, hs.denseRange_val.dense_image continuous_subtype_val htd⟩ /-- Let `s` be a dense set in a topological space `α` with partial order structure. If `s` is a separable space (e.g., if `α` has a second countable topology), then there exists a countable dense subset `t ⊆ s` such that `t` contains bottom/top element of `α` when they exist and belong to `s`. For a dense subset containing neither bot nor top elements, see `Dense.exists_countable_dense_subset_no_bot_top`. -/ theorem Dense.exists_countable_dense_subset_bot_top {α : Type} [TopologicalSpace α] [PartialOrder α] {s : Set α} [SeparableSpace s] (hs : Dense s) : ∃ t ⊆ s, t.Countable ∧ Dense t ∧ (∀ x, IsBot x → x ∈ s → x ∈ t) ∧ ∀ x, IsTop x → x ∈ s → x ∈ t := by rcases hs.exists_countable_dense_subset with ⟨t, hts, htc, htd⟩ refine ⟨(t ∪ ({ x \| IsBot x } ∪ { x \| IsTop x })) ∩ s, ?_, ?_, ?_, ?_, ?_⟩ exacts [inter_subset_right, (htc.union ((countable_isBot α).union (countable_isTop α))).mono inter_subset_left, htd.mono (subset_inter subset_union_left hts), fun x hx hxs => ⟨Or.inr <\| Or.inl hx, hxs⟩, fun x hx hxs => ⟨Or.inr <\| Or.inr hx, hxs⟩] instance separableSpace_univ {α : Type} [TopologicalSpace α] [SeparableSpace α] : SeparableSpace (univ : Set α) := (Equiv.Set.univ α).symm.surjective.denseRange.separableSpace (continuous_id.subtype_mk _) /-- If `α` is a separable topological space with a partial order, then there exists a countable dense set `s : Set α` that contains those of both bottom and top elements of `α` that actually exist. For a dense set containing neither bot nor top elements, see `exists_countable_dense_no_bot_top`. -/ theorem exists_countable_dense_bot_top (α : Type) [TopologicalSpace α] [SeparableSpace α] [PartialOrder α] : ∃ s : Set α, s.Countable ∧ Dense s ∧ (∀ x, IsBot x → x ∈ s) ∧ ∀ x, IsTop x → x ∈ s := by simpa using dense_univ.exists_countable_dense_subset_bot_top	namespace TopologicalSpace universe u variable (α : Type u) [t : TopologicalSpace α] /-- A first-countable space is one in which every point has a countable neighborhood basis. -/ class _root_.FirstCountableTopology : Prop where /-- The filter `𝓝 a` is countably generated for all points `a`. -/	Mathlib/Topology/Bases.lean	623	633
/- Copyright (c) 2020 Kenji Nakagawa. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kenji Nakagawa, Anne Baanen, Filippo A. E. Nuccio -/ import Mathlib.Algebra.Algebra.Subalgebra.Pointwise import Mathlib.Algebra.Polynomial.FieldDivision import Mathlib.RingTheory.Spectrum.Maximal.Localization import Mathlib.RingTheory.ChainOfDivisors import Mathlib.RingTheory.DedekindDomain.Basic import Mathlib.RingTheory.FractionalIdeal.Operations import Mathlib.Algebra.Squarefree.Basic /-! # Dedekind domains and ideals In this file, we show a ring is a Dedekind domain iff all fractional ideals are invertible. Then we prove some results on the unique factorization monoid structure of the ideals. ## Main definitions - `IsDedekindDomainInv` alternatively defines a Dedekind domain as an integral domain where every nonzero fractional ideal is invertible. - `isDedekindDomainInv_iff` shows that this does note depend on the choice of field of fractions. - `IsDedekindDomain.HeightOneSpectrum` defines the type of nonzero prime ideals of `R`. ## Main results: - `isDedekindDomain_iff_isDedekindDomainInv` - `Ideal.uniqueFactorizationMonoid` ## Implementation notes The definitions that involve a field of fractions choose a canonical field of fractions, but are independent of that choice. The `..._iff` lemmas express this independence. Often, definitions assume that Dedekind domains are not fields. We found it more practical to add a `(h : ¬ IsField A)` assumption whenever this is explicitly needed. ## References * [D. Marcus, Number Fields][marcus1977number] * [J.W.S. Cassels, A. Fröhlich, Algebraic Number Theory][cassels1967algebraic] * [J. Neukirch, Algebraic Number Theory][Neukirch1992] ## Tags dedekind domain, dedekind ring -/ variable (R A K : Type) [CommRing R] [CommRing A] [Field K] open scoped nonZeroDivisors Polynomial section Inverse namespace FractionalIdeal variable {R₁ : Type} [CommRing R₁] [IsDomain R₁] [Algebra R₁ K] [IsFractionRing R₁ K] variable {I J : FractionalIdeal R₁⁰ K} noncomputable instance : Inv (FractionalIdeal R₁⁰ K) := ⟨fun I => 1 / I⟩ theorem inv_eq : I⁻¹ = 1 / I := rfl theorem inv_zero' : (0 : FractionalIdeal R₁⁰ K)⁻¹ = 0 := div_zero theorem inv_nonzero {J : FractionalIdeal R₁⁰ K} (h : J ≠ 0) : J⁻¹ = ⟨(1 : FractionalIdeal R₁⁰ K) / J, fractional_div_of_nonzero h⟩ := div_nonzero h theorem coe_inv_of_nonzero {J : FractionalIdeal R₁⁰ K} (h : J ≠ 0) : (↑J⁻¹ : Submodule R₁ K) = IsLocalization.coeSubmodule K ⊤ / (J : Submodule R₁ K) := by simp_rw [inv_nonzero _ h, coe_one, coe_mk, IsLocalization.coeSubmodule_top] variable {K} theorem mem_inv_iff (hI : I ≠ 0) {x : K} : x ∈ I⁻¹ ↔ ∀ y ∈ I, x * y ∈ (1 : FractionalIdeal R₁⁰ K) := mem_div_iff_of_nonzero hI theorem inv_anti_mono (hI : I ≠ 0) (hJ : J ≠ 0) (hIJ : I ≤ J) : J⁻¹ ≤ I⁻¹ := by -- Porting note: in Lean3, introducing `x` would just give `x ∈ J⁻¹ → x ∈ I⁻¹`, but -- in Lean4, it goes all the way down to the subtypes intro x simp only [val_eq_coe, mem_coe, mem_inv_iff hJ, mem_inv_iff hI] exact fun h y hy => h y (hIJ hy) theorem le_self_mul_inv {I : FractionalIdeal R₁⁰ K} (hI : I ≤ (1 : FractionalIdeal R₁⁰ K)) : I ≤ I * I⁻¹ := le_self_mul_one_div hI variable (K) theorem coe_ideal_le_self_mul_inv (I : Ideal R₁) : (I : FractionalIdeal R₁⁰ K) ≤ I * (I : FractionalIdeal R₁⁰ K)⁻¹ := le_self_mul_inv coeIdeal_le_one /-- `I⁻¹` is the inverse of `I` if `I` has an inverse. -/ theorem right_inverse_eq (I J : FractionalIdeal R₁⁰ K) (h : I * J = 1) : J = I⁻¹ := 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_inv_cancel_iff {I : FractionalIdeal R₁⁰ K} : I * I⁻¹ = 1 ↔ ∃ J, I * J = 1 := ⟨fun h => ⟨I⁻¹, h⟩, fun ⟨J, hJ⟩ => by rwa [← right_inverse_eq K I J hJ]⟩ theorem mul_inv_cancel_iff_isUnit {I : FractionalIdeal R₁⁰ K} : I * I⁻¹ = 1 ↔ IsUnit I := (mul_inv_cancel_iff K).trans isUnit_iff_exists_inv.symm variable {K' : Type} [Field K'] [Algebra R₁ K'] [IsFractionRing R₁ K'] @[simp] protected theorem map_inv (I : FractionalIdeal R₁⁰ K) (h : K ≃ₐ[R₁] K') : I⁻¹.map (h : K →ₐ[R₁] K') = (I.map h)⁻¹ := by rw [inv_eq, FractionalIdeal.map_div, FractionalIdeal.map_one, inv_eq] open Submodule Submodule.IsPrincipal @[simp] theorem spanSingleton_inv (x : K) : (spanSingleton R₁⁰ x)⁻¹ = spanSingleton _ x⁻¹ := one_div_spanSingleton x theorem spanSingleton_div_spanSingleton (x y : K) : spanSingleton R₁⁰ x / spanSingleton R₁⁰ y = spanSingleton R₁⁰ (x / y) := by rw [div_spanSingleton, mul_comm, spanSingleton_mul_spanSingleton, div_eq_mul_inv] theorem spanSingleton_div_self {x : K} (hx : x ≠ 0) : spanSingleton R₁⁰ x / spanSingleton R₁⁰ x = 1 := by rw [spanSingleton_div_spanSingleton, div_self hx, spanSingleton_one] theorem coe_ideal_span_singleton_div_self {x : R₁} (hx : x ≠ 0) : (Ideal.span ({x} : Set R₁) : FractionalIdeal R₁⁰ K) / Ideal.span ({x} : Set R₁) = 1 := by rw [coeIdeal_span_singleton, spanSingleton_div_self K <\| (map_ne_zero_iff _ <\| FaithfulSMul.algebraMap_injective R₁ K).mpr hx] theorem spanSingleton_mul_inv {x : K} (hx : x ≠ 0) : spanSingleton R₁⁰ x (spanSingleton R₁⁰ x)⁻¹ = 1 := by rw [spanSingleton_inv, spanSingleton_mul_spanSingleton, mul_inv_cancel₀ hx, spanSingleton_one] theorem coe_ideal_span_singleton_mul_inv {x : R₁} (hx : x ≠ 0) : (Ideal.span ({x} : Set R₁) : FractionalIdeal R₁⁰ K) * (Ideal.span ({x} : Set R₁) : FractionalIdeal R₁⁰ K)⁻¹ = 1 := by rw [coeIdeal_span_singleton, spanSingleton_mul_inv K <\| (map_ne_zero_iff _ <\| FaithfulSMul.algebraMap_injective R₁ K).mpr hx] theorem spanSingleton_inv_mul {x : K} (hx : x ≠ 0) : (spanSingleton R₁⁰ x)⁻¹ * spanSingleton R₁⁰ x = 1 := by rw [mul_comm, spanSingleton_mul_inv K hx] theorem coe_ideal_span_singleton_inv_mul {x : R₁} (hx : x ≠ 0) : (Ideal.span ({x} : Set R₁) : FractionalIdeal R₁⁰ K)⁻¹ * Ideal.span ({x} : Set R₁) = 1 := by rw [mul_comm, coe_ideal_span_singleton_mul_inv K hx] theorem mul_generator_self_inv {R₁ : Type} [CommRing R₁] [Algebra R₁ K] [IsLocalization R₁⁰ K] (I : FractionalIdeal R₁⁰ K) [Submodule.IsPrincipal (I : Submodule R₁ K)] (h : I ≠ 0) : I spanSingleton _ (generator (I : Submodule R₁ K))⁻¹ = 1 := by -- Rewrite only the `I` that appears alone. conv_lhs => congr; rw [eq_spanSingleton_of_principal I] rw [spanSingleton_mul_spanSingleton, mul_inv_cancel₀, spanSingleton_one] intro generator_I_eq_zero apply h rw [eq_spanSingleton_of_principal I, generator_I_eq_zero, spanSingleton_zero] theorem invertible_of_principal (I : FractionalIdeal R₁⁰ K) [Submodule.IsPrincipal (I : Submodule R₁ K)] (h : I ≠ 0) : I * I⁻¹ = 1 := mul_div_self_cancel_iff.mpr ⟨spanSingleton _ (generator (I : Submodule R₁ K))⁻¹, mul_generator_self_inv _ I h⟩ theorem invertible_iff_generator_nonzero (I : FractionalIdeal R₁⁰ K) [Submodule.IsPrincipal (I : Submodule R₁ K)] : I * I⁻¹ = 1 ↔ generator (I : Submodule R₁ K) ≠ 0 := by constructor · intro hI hg apply ne_zero_of_mul_eq_one _ _ hI rw [eq_spanSingleton_of_principal I, hg, spanSingleton_zero] · intro hg apply invertible_of_principal rw [eq_spanSingleton_of_principal I] intro hI have := mem_spanSingleton_self R₁⁰ (generator (I : Submodule R₁ K)) rw [hI, mem_zero_iff] at this contradiction theorem isPrincipal_inv (I : FractionalIdeal R₁⁰ K) [Submodule.IsPrincipal (I : Submodule R₁ K)] (h : I ≠ 0) : Submodule.IsPrincipal I⁻¹.1 := by rw [val_eq_coe, isPrincipal_iff] use (generator (I : Submodule R₁ K))⁻¹ have hI : I * spanSingleton _ (generator (I : Submodule R₁ K))⁻¹ = 1 := mul_generator_self_inv _ I h exact (right_inverse_eq _ I (spanSingleton _ (generator (I : Submodule R₁ K))⁻¹) hI).symm variable {K} lemma den_mem_inv {I : FractionalIdeal R₁⁰ K} (hI : I ≠ ⊥) : (algebraMap R₁ K) (I.den : R₁) ∈ I⁻¹ := by rw [mem_inv_iff hI] intro i hi rw [← Algebra.smul_def (I.den : R₁) i, ← mem_coe, coe_one] suffices Submodule.map (Algebra.linearMap R₁ K) I.num ≤ 1 from this <\| (den_mul_self_eq_num I).symm ▸ smul_mem_pointwise_smul i I.den I.coeToSubmodule hi apply le_trans <\| map_mono (show I.num ≤ 1 by simp only [Ideal.one_eq_top, le_top, bot_eq_zero]) rw [Ideal.one_eq_top, Submodule.map_top, one_eq_range] lemma num_le_mul_inv (I : FractionalIdeal R₁⁰ K) : I.num ≤ I * I⁻¹ := by by_cases hI : I = 0 · rw [hI, num_zero_eq <\| FaithfulSMul.algebraMap_injective R₁ K, zero_mul, zero_eq_bot, coeIdeal_bot] · rw [mul_comm, ← den_mul_self_eq_num'] exact mul_right_mono I <\| spanSingleton_le_iff_mem.2 (den_mem_inv hI) lemma bot_lt_mul_inv {I : FractionalIdeal R₁⁰ K} (hI : I ≠ ⊥) : ⊥ < I * I⁻¹ := lt_of_lt_of_le (coeIdeal_ne_zero.2 (hI ∘ num_eq_zero_iff.1)).bot_lt I.num_le_mul_inv noncomputable instance : InvOneClass (FractionalIdeal R₁⁰ K) := { inv_one := div_one } end FractionalIdeal section IsDedekindDomainInv variable [IsDomain A] /-- A Dedekind domain is an integral domain such that every fractional ideal has an inverse. This is equivalent to `IsDedekindDomain`. In particular we provide a `fractional_ideal.comm_group_with_zero` instance, assuming `IsDedekindDomain A`, which implies `IsDedekindDomainInv`. For integral ideals, `IsDedekindDomain`(`_inv`) implies only `Ideal.cancelCommMonoidWithZero`. -/ def IsDedekindDomainInv : Prop := ∀ I ≠ (⊥ : FractionalIdeal A⁰ (FractionRing A)), I * I⁻¹ = 1 open FractionalIdeal variable {R A K} theorem isDedekindDomainInv_iff [Algebra A K] [IsFractionRing A K] : IsDedekindDomainInv A ↔ ∀ I ≠ (⊥ : FractionalIdeal A⁰ K), I * I⁻¹ = 1 := by let h : FractionalIdeal A⁰ (FractionRing A) ≃+* FractionalIdeal A⁰ K := FractionalIdeal.mapEquiv (FractionRing.algEquiv A K) refine h.toEquiv.forall_congr (fun {x} => ?_) rw [← h.toEquiv.apply_eq_iff_eq] simp [h, IsDedekindDomainInv] theorem FractionalIdeal.adjoinIntegral_eq_one_of_isUnit [Algebra A K] [IsFractionRing A K] (x : K) (hx : IsIntegral A x) (hI : IsUnit (adjoinIntegral A⁰ x hx)) : adjoinIntegral A⁰ x hx = 1 := by set I := adjoinIntegral A⁰ x hx have mul_self : IsIdempotentElem I := by apply coeToSubmodule_injective simp only [coe_mul, adjoinIntegral_coe, I] rw [(Algebra.adjoin A {x}).isIdempotentElem_toSubmodule] convert congr_arg (· * I⁻¹) mul_self <;> simp only [(mul_inv_cancel_iff_isUnit K).mpr hI, mul_assoc, mul_one] namespace IsDedekindDomainInv variable [Algebra A K] [IsFractionRing A K] (h : IsDedekindDomainInv A) include h theorem mul_inv_eq_one {I : FractionalIdeal A⁰ K} (hI : I ≠ 0) : I * I⁻¹ = 1 := isDedekindDomainInv_iff.mp h I hI theorem inv_mul_eq_one {I : FractionalIdeal A⁰ K} (hI : I ≠ 0) : I⁻¹ * I = 1 := (mul_comm _ _).trans (h.mul_inv_eq_one hI) protected theorem isUnit {I : FractionalIdeal A⁰ K} (hI : I ≠ 0) : IsUnit I := isUnit_of_mul_eq_one _ _ (h.mul_inv_eq_one hI) theorem isNoetherianRing : IsNoetherianRing A := by refine isNoetherianRing_iff.mpr ⟨fun I : Ideal A => ?_⟩ by_cases hI : I = ⊥ · rw [hI]; apply Submodule.fg_bot have hI : (I : FractionalIdeal A⁰ (FractionRing A)) ≠ 0 := coeIdeal_ne_zero.mpr hI exact I.fg_of_isUnit (IsFractionRing.injective A (FractionRing A)) (h.isUnit hI) theorem integrallyClosed : IsIntegrallyClosed A := by -- It suffices to show that for integral `x`, -- `A[x]` (which is a fractional ideal) is in fact equal to `A`. refine (isIntegrallyClosed_iff (FractionRing A)).mpr (fun {x hx} => ?_) rw [← Set.mem_range, ← Algebra.mem_bot, ← Subalgebra.mem_toSubmodule, Algebra.toSubmodule_bot, Submodule.one_eq_span, ← coe_spanSingleton A⁰ (1 : FractionRing A), spanSingleton_one, ← FractionalIdeal.adjoinIntegral_eq_one_of_isUnit x hx (h.isUnit _)] · exact mem_adjoinIntegral_self A⁰ x hx · exact fun h => one_ne_zero (eq_zero_iff.mp h 1 (Algebra.adjoin A {x}).one_mem) open Ring theorem dimensionLEOne : DimensionLEOne A := ⟨by -- We're going to show that `P` is maximal because any (maximal) ideal `M` -- that is strictly larger would be `⊤`. rintro P P_ne hP refine Ideal.isMaximal_def.mpr ⟨hP.ne_top, fun M hM => ?_⟩ -- We may assume `P` and `M` (as fractional ideals) are nonzero. have P'_ne : (P : FractionalIdeal A⁰ (FractionRing A)) ≠ 0 := coeIdeal_ne_zero.mpr P_ne have M'_ne : (M : FractionalIdeal A⁰ (FractionRing A)) ≠ 0 := coeIdeal_ne_zero.mpr hM.ne_bot -- In particular, we'll show `M⁻¹ * P ≤ P` suffices (M⁻¹ : FractionalIdeal A⁰ (FractionRing A)) * P ≤ P by rw [eq_top_iff, ← coeIdeal_le_coeIdeal (FractionRing A), coeIdeal_top] calc (1 : FractionalIdeal A⁰ (FractionRing A)) = _ * _ * _ := ?_ _ ≤ _ * _ := mul_right_mono ((P : FractionalIdeal A⁰ (FractionRing A))⁻¹ * M : FractionalIdeal A⁰ (FractionRing A)) this _ = M := ?_ · rw [mul_assoc, ← mul_assoc (P : FractionalIdeal A⁰ (FractionRing A)), h.mul_inv_eq_one P'_ne, one_mul, h.inv_mul_eq_one M'_ne] · rw [← mul_assoc (P : FractionalIdeal A⁰ (FractionRing A)), h.mul_inv_eq_one P'_ne, one_mul] -- Suppose we have `x ∈ M⁻¹ * P`, then in fact `x = algebraMap _ _ y` for some `y`. intro x hx have le_one : (M⁻¹ : FractionalIdeal A⁰ (FractionRing A)) * P ≤ 1 := by rw [← h.inv_mul_eq_one M'_ne] exact mul_left_mono _ ((coeIdeal_le_coeIdeal (FractionRing A)).mpr hM.le) obtain ⟨y, _hy, rfl⟩ := (mem_coeIdeal _).mp (le_one hx) -- Since `M` is strictly greater than `P`, let `z ∈ M \ P`. obtain ⟨z, hzM, hzp⟩ := SetLike.exists_of_lt hM -- We have `z * y ∈ M * (M⁻¹ * P) = P`. have zy_mem := mul_mem_mul (mem_coeIdeal_of_mem A⁰ hzM) hx rw [← RingHom.map_mul, ← mul_assoc, h.mul_inv_eq_one M'_ne, one_mul] at zy_mem obtain ⟨zy, hzy, zy_eq⟩ := (mem_coeIdeal A⁰).mp zy_mem rw [IsFractionRing.injective A (FractionRing A) zy_eq] at hzy -- But `P` is a prime ideal, so `z ∉ P` implies `y ∈ P`, as desired. exact mem_coeIdeal_of_mem A⁰ (Or.resolve_left (hP.mem_or_mem hzy) hzp)⟩ /-- Showing one side of the equivalence between the definitions `IsDedekindDomainInv` and `IsDedekindDomain` of Dedekind domains. -/ theorem isDedekindDomain : IsDedekindDomain A := { h.isNoetherianRing, h.dimensionLEOne, h.integrallyClosed with } end IsDedekindDomainInv end IsDedekindDomainInv variable [Algebra A K] [IsFractionRing A K] variable {A K} theorem one_mem_inv_coe_ideal [IsDomain A] {I : Ideal A} (hI : I ≠ ⊥) : (1 : K) ∈ (I : FractionalIdeal A⁰ K)⁻¹ := by rw [FractionalIdeal.mem_inv_iff (FractionalIdeal.coeIdeal_ne_zero.mpr hI)] intro y hy rw [one_mul] exact FractionalIdeal.coeIdeal_le_one hy /-- Specialization of `exists_primeSpectrum_prod_le_and_ne_bot_of_domain` to Dedekind domains: Let `I : Ideal A` be a nonzero ideal, where `A` is a Dedekind domain that is not a field. Then `exists_primeSpectrum_prod_le_and_ne_bot_of_domain` states we can find a product of prime ideals that is contained within `I`. This lemma extends that result by making the product minimal: let `M` be a maximal ideal that contains `I`, then the product including `M` is contained within `I` and the product excluding `M` is not contained within `I`. -/ theorem exists_multiset_prod_cons_le_and_prod_not_le [IsDedekindDomain A] (hNF : ¬IsField A) {I M : Ideal A} (hI0 : I ≠ ⊥) (hIM : I ≤ M) [hM : M.IsMaximal] : ∃ Z : Multiset (PrimeSpectrum A), (M ::ₘ Z.map PrimeSpectrum.asIdeal).prod ≤ I ∧ ¬Multiset.prod (Z.map PrimeSpectrum.asIdeal) ≤ I := by -- Let `Z` be a minimal set of prime ideals such that their product is contained in `J`. obtain ⟨Z₀, hZ₀⟩ := PrimeSpectrum.exists_primeSpectrum_prod_le_and_ne_bot_of_domain hNF hI0 obtain ⟨Z, ⟨hZI, hprodZ⟩, h_eraseZ⟩ := wellFounded_lt.has_min {Z \| (Z.map PrimeSpectrum.asIdeal).prod ≤ I ∧ (Z.map PrimeSpectrum.asIdeal).prod ≠ ⊥} ⟨Z₀, hZ₀.1, hZ₀.2⟩ obtain ⟨_, hPZ', hPM⟩ := hM.isPrime.multiset_prod_le.mp (hZI.trans hIM) -- Then in fact there is a `P ∈ Z` with `P ≤ M`. obtain ⟨P, hPZ, rfl⟩ := Multiset.mem_map.mp hPZ' classical have := Multiset.map_erase PrimeSpectrum.asIdeal (fun _ _ => PrimeSpectrum.ext) P Z obtain ⟨hP0, hZP0⟩ : P.asIdeal ≠ ⊥ ∧ ((Z.erase P).map PrimeSpectrum.asIdeal).prod ≠ ⊥ := by rwa [Ne, ← Multiset.cons_erase hPZ', Multiset.prod_cons, Ideal.mul_eq_bot, not_or, ← this] at hprodZ -- By maximality of `P` and `M`, we have that `P ≤ M` implies `P = M`. have hPM' := (P.isPrime.isMaximal hP0).eq_of_le hM.ne_top hPM subst hPM' -- By minimality of `Z`, erasing `P` from `Z` is exactly what we need. refine ⟨Z.erase P, ?_, ?_⟩ · convert hZI rw [this, Multiset.cons_erase hPZ'] · refine fun h => h_eraseZ (Z.erase P) ⟨h, ?_⟩ (Multiset.erase_lt.mpr hPZ) exact hZP0 namespace FractionalIdeal open Ideal lemma not_inv_le_one_of_ne_bot [IsDedekindDomain A] {I : Ideal A} (hI0 : I ≠ ⊥) (hI1 : I ≠ ⊤) : ¬(I⁻¹ : FractionalIdeal A⁰ K) ≤ 1 := by have hNF : ¬IsField A := fun h ↦ letI := h.toField; (eq_bot_or_eq_top I).elim hI0 hI1 wlog hM : I.IsMaximal generalizing I · rcases I.exists_le_maximal hI1 with ⟨M, hmax, hIM⟩ have hMbot : M ≠ ⊥ := (M.bot_lt_of_maximal hNF).ne' refine mt (le_trans <\| inv_anti_mono ?_ ?_ ?_) (this hMbot hmax.ne_top hmax) <;> simpa only [coeIdeal_ne_zero, coeIdeal_le_coeIdeal] have hI0 : ⊥ < I := I.bot_lt_of_maximal hNF obtain ⟨⟨a, haI⟩, ha0⟩ := Submodule.nonzero_mem_of_bot_lt hI0 replace ha0 : a ≠ 0 := Subtype.coe_injective.ne ha0 let J : Ideal A := Ideal.span {a} have hJ0 : J ≠ ⊥ := mt Ideal.span_singleton_eq_bot.mp ha0 have hJI : J ≤ I := I.span_singleton_le_iff_mem.2 haI -- Then we can find a product of prime (hence maximal) ideals contained in `J`, -- such that removing element `M` from the product is not contained in `J`. obtain ⟨Z, hle, hnle⟩ := exists_multiset_prod_cons_le_and_prod_not_le hNF hJ0 hJI -- Choose an element `b` of the product that is not in `J`. obtain ⟨b, hbZ, hbJ⟩ := SetLike.not_le_iff_exists.mp hnle have hnz_fa : algebraMap A K a ≠ 0 := mt ((injective_iff_map_eq_zero _).mp (IsFractionRing.injective A K) a) ha0 -- Then `b a⁻¹ : K` is in `M⁻¹` but not in `1`. refine Set.not_subset.2 ⟨algebraMap A K b * (algebraMap A K a)⁻¹, (mem_inv_iff ?_).mpr ?_, ?_⟩ · exact coeIdeal_ne_zero.mpr hI0.ne' · rintro y₀ hy₀ obtain ⟨y, h_Iy, rfl⟩ := (mem_coeIdeal _).mp hy₀ rw [mul_comm, ← mul_assoc, ← RingHom.map_mul] have h_yb : y * b ∈ J := by apply hle rw [Multiset.prod_cons] exact Submodule.smul_mem_smul h_Iy hbZ rw [Ideal.mem_span_singleton'] at h_yb rcases h_yb with ⟨c, hc⟩ rw [← hc, RingHom.map_mul, mul_assoc, mul_inv_cancel₀ hnz_fa, mul_one] apply coe_mem_one · refine mt (mem_one_iff _).mp ?_ rintro ⟨x', h₂_abs⟩ rw [← div_eq_mul_inv, eq_div_iff_mul_eq hnz_fa, ← RingHom.map_mul] at h₂_abs have := Ideal.mem_span_singleton'.mpr ⟨x', IsFractionRing.injective A K h₂_abs⟩ contradiction theorem exists_not_mem_one_of_ne_bot [IsDedekindDomain A] {I : Ideal A} (hI0 : I ≠ ⊥) (hI1 : I ≠ ⊤) : ∃ x ∈ (I⁻¹ : FractionalIdeal A⁰ K), x ∉ (1 : FractionalIdeal A⁰ K) := Set.not_subset.1 <\| not_inv_le_one_of_ne_bot hI0 hI1 theorem mul_inv_cancel_of_le_one [h : IsDedekindDomain A] {I : Ideal A} (hI0 : I ≠ ⊥) (hI : (I * (I : FractionalIdeal A⁰ K)⁻¹)⁻¹ ≤ 1) : I * (I : FractionalIdeal A⁰ K)⁻¹ = 1 := by -- We'll show a contradiction with `exists_not_mem_one_of_ne_bot`: -- `J⁻¹ = (I * I⁻¹)⁻¹` cannot have an element `x ∉ 1`, so it must equal `1`. obtain ⟨J, hJ⟩ : ∃ J : Ideal A, (J : FractionalIdeal A⁰ K) = I * (I : FractionalIdeal A⁰ K)⁻¹ := le_one_iff_exists_coeIdeal.mp mul_one_div_le_one by_cases hJ0 : J = ⊥ · subst hJ0 refine absurd ?_ hI0 rw [eq_bot_iff, ← coeIdeal_le_coeIdeal K, hJ] exact coe_ideal_le_self_mul_inv K I by_cases hJ1 : J = ⊤ · rw [← hJ, hJ1, coeIdeal_top] exact (not_inv_le_one_of_ne_bot (K := K) hJ0 hJ1 (hJ ▸ hI)).elim /-- Nonzero integral ideals in a Dedekind domain are invertible. We will use this to show that nonzero fractional ideals are invertible, and finally conclude that fractional ideals in a Dedekind domain form a group with zero. -/ theorem coe_ideal_mul_inv [h : IsDedekindDomain A] (I : Ideal A) (hI0 : I ≠ ⊥) : I * (I : FractionalIdeal A⁰ K)⁻¹ = 1 := by -- We'll show `1 ≤ J⁻¹ = (I * I⁻¹)⁻¹ ≤ 1`. apply mul_inv_cancel_of_le_one hI0 by_cases hJ0 : I * (I : FractionalIdeal A⁰ K)⁻¹ = 0 · rw [hJ0, inv_zero']; exact zero_le _ intro x hx -- In particular, we'll show all `x ∈ J⁻¹` are integral. suffices x ∈ integralClosure A K by rwa [IsIntegrallyClosed.integralClosure_eq_bot, Algebra.mem_bot, Set.mem_range, ← mem_one_iff] at this -- For that, we'll find a subalgebra that is f.g. as a module and contains `x`. -- `A` is a noetherian ring, so we just need to find a subalgebra between `{x}` and `I⁻¹`. rw [mem_integralClosure_iff_mem_fg] have x_mul_mem : ∀ b ∈ (I⁻¹ : FractionalIdeal A⁰ K), x * b ∈ (I⁻¹ : FractionalIdeal A⁰ K) := by intro b hb rw [mem_inv_iff (coeIdeal_ne_zero.mpr hI0)] dsimp only at hx rw [val_eq_coe, mem_coe, mem_inv_iff hJ0] at hx simp only [mul_assoc, mul_comm b] at hx ⊢ intro y hy exact hx _ (mul_mem_mul hy hb) -- It turns out the subalgebra consisting of all `p(x)` for `p : A[X]` works. refine ⟨AlgHom.range (Polynomial.aeval x : A[X] →ₐ[A] K), isNoetherian_submodule.mp (isNoetherian (I : FractionalIdeal A⁰ K)⁻¹) _ fun y hy => ?_, ⟨Polynomial.X, Polynomial.aeval_X x⟩⟩ obtain ⟨p, rfl⟩ := (AlgHom.mem_range _).mp hy rw [Polynomial.aeval_eq_sum_range] refine Submodule.sum_mem _ fun i hi => Submodule.smul_mem _ _ ?_ clear hi induction' i with i ih · rw [pow_zero]; exact one_mem_inv_coe_ideal hI0 · show x ^ i.succ ∈ (I⁻¹ : FractionalIdeal A⁰ K) rw [pow_succ']; exact x_mul_mem _ ih /-- Nonzero fractional ideals in a Dedekind domain are units. This is also available as `_root_.mul_inv_cancel`, using the `Semifield` instance defined below. -/ protected theorem mul_inv_cancel [IsDedekindDomain A] {I : FractionalIdeal A⁰ K} (hne : I ≠ 0) : I * I⁻¹ = 1 := by obtain ⟨a, J, ha, hJ⟩ : ∃ (a : A) (aI : Ideal A), a ≠ 0 ∧ I = spanSingleton A⁰ (algebraMap A K a)⁻¹ * aI := exists_eq_spanSingleton_mul I suffices h₂ : I * (spanSingleton A⁰ (algebraMap _ _ a) * (J : FractionalIdeal A⁰ K)⁻¹) = 1 by rw [mul_inv_cancel_iff] exact ⟨spanSingleton A⁰ (algebraMap _ _ a) * (J : FractionalIdeal A⁰ K)⁻¹, h₂⟩ subst hJ rw [mul_assoc, mul_left_comm (J : FractionalIdeal A⁰ K), coe_ideal_mul_inv, mul_one, spanSingleton_mul_spanSingleton, inv_mul_cancel₀, spanSingleton_one] · exact mt ((injective_iff_map_eq_zero (algebraMap A K)).mp (IsFractionRing.injective A K) _) ha · exact coeIdeal_ne_zero.mp (right_ne_zero_of_mul hne) theorem mul_right_le_iff [IsDedekindDomain A] {J : FractionalIdeal A⁰ K} (hJ : J ≠ 0) : ∀ {I I'}, I * J ≤ I' * J ↔ I ≤ I' := by intro I I' constructor · intro h convert mul_right_mono J⁻¹ h <;> dsimp only <;> rw [mul_assoc, FractionalIdeal.mul_inv_cancel hJ, mul_one] · exact fun h => mul_right_mono J h theorem mul_left_le_iff [IsDedekindDomain A] {J : FractionalIdeal A⁰ K} (hJ : J ≠ 0) {I I'} : J * I ≤ J * I' ↔ I ≤ I' := by convert mul_right_le_iff hJ using 1; simp only [mul_comm] theorem mul_right_strictMono [IsDedekindDomain A] {I : FractionalIdeal A⁰ K} (hI : I ≠ 0) : StrictMono (· * I) := strictMono_of_le_iff_le fun _ _ => (mul_right_le_iff hI).symm theorem mul_left_strictMono [IsDedekindDomain A] {I : FractionalIdeal A⁰ K} (hI : I ≠ 0) : StrictMono (I * ·) := strictMono_of_le_iff_le fun _ _ => (mul_left_le_iff hI).symm /-- This is also available as `_root_.div_eq_mul_inv`, using the `Semifield` instance defined below. -/ protected theorem div_eq_mul_inv [IsDedekindDomain A] (I J : FractionalIdeal A⁰ K) : I / J = I * J⁻¹ := by by_cases hJ : J = 0 · rw [hJ, div_zero, inv_zero', mul_zero] refine le_antisymm ((mul_right_le_iff hJ).mp ?_) ((le_div_iff_mul_le hJ).mpr ?_) · rw [mul_assoc, mul_comm J⁻¹, FractionalIdeal.mul_inv_cancel hJ, mul_one, mul_le] intro x hx y hy rw [mem_div_iff_of_nonzero hJ] at hx exact hx y hy rw [mul_assoc, mul_comm J⁻¹, FractionalIdeal.mul_inv_cancel hJ, mul_one] end FractionalIdeal /-- `IsDedekindDomain` and `IsDedekindDomainInv` are equivalent ways to express that an integral domain is a Dedekind domain. -/ theorem isDedekindDomain_iff_isDedekindDomainInv [IsDomain A] : IsDedekindDomain A ↔ IsDedekindDomainInv A := ⟨fun _h _I hI => FractionalIdeal.mul_inv_cancel hI, fun h => h.isDedekindDomain⟩ end Inverse section IsDedekindDomain variable {R A} variable [IsDedekindDomain A] [Algebra A K] [IsFractionRing A K] open FractionalIdeal open Ideal noncomputable instance FractionalIdeal.semifield : Semifield (FractionalIdeal A⁰ K) where __ := coeIdeal_injective.nontrivial inv_zero := inv_zero' _ div_eq_mul_inv := FractionalIdeal.div_eq_mul_inv mul_inv_cancel _ := FractionalIdeal.mul_inv_cancel nnqsmul := _ nnqsmul_def := fun _ _ => rfl #adaptation_note /-- 2025-03-29 for lean4#7717 had to add `mul_left_cancel_of_ne_zero` field. TODO(kmill) There is trouble calculating the type of the `IsLeftCancelMulZero` parent. -/ /-- Fractional ideals have cancellative multiplication in a Dedekind domain. Although this instance is a direct consequence of the instance `FractionalIdeal.semifield`, we define this instance to provide a computable alternative. -/ instance FractionalIdeal.cancelCommMonoidWithZero : CancelCommMonoidWithZero (FractionalIdeal A⁰ K) where __ : CommSemiring (FractionalIdeal A⁰ K) := inferInstance mul_left_cancel_of_ne_zero := mul_left_cancel₀ instance Ideal.cancelCommMonoidWithZero : CancelCommMonoidWithZero (Ideal A) := { Function.Injective.cancelCommMonoidWithZero (coeIdealHom A⁰ (FractionRing A)) coeIdeal_injective (RingHom.map_zero _) (RingHom.map_one _) (RingHom.map_mul _) (RingHom.map_pow _) with } -- Porting note: Lean can infer all it needs by itself instance Ideal.isDomain : IsDomain (Ideal A) := { } /-- For ideals in a Dedekind domain, to divide is to contain. -/ theorem Ideal.dvd_iff_le {I J : Ideal A} : I ∣ J ↔ J ≤ I := ⟨Ideal.le_of_dvd, fun h => by by_cases hI : I = ⊥ · have hJ : J = ⊥ := by rwa [hI, ← eq_bot_iff] at h rw [hI, hJ] have hI' : (I : FractionalIdeal A⁰ (FractionRing A)) ≠ 0 := coeIdeal_ne_zero.mpr hI have : (I : FractionalIdeal A⁰ (FractionRing A))⁻¹ * J ≤ 1 := by rw [← inv_mul_cancel₀ hI'] exact mul_left_mono _ ((coeIdeal_le_coeIdeal _).mpr h) obtain ⟨H, hH⟩ := le_one_iff_exists_coeIdeal.mp this use H refine coeIdeal_injective (show (J : FractionalIdeal A⁰ (FractionRing A)) = ↑(I * H) from ?_) rw [coeIdeal_mul, hH, ← mul_assoc, mul_inv_cancel₀ hI', one_mul]⟩ theorem Ideal.dvdNotUnit_iff_lt {I J : Ideal A} : DvdNotUnit I J ↔ J < I := ⟨fun ⟨hI, H, hunit, hmul⟩ => lt_of_le_of_ne (Ideal.dvd_iff_le.mp ⟨H, hmul⟩) (mt (fun h => have : H = 1 := mul_left_cancel₀ hI (by rw [← hmul, h, mul_one]) show IsUnit H from this.symm ▸ isUnit_one) hunit), fun h => dvdNotUnit_of_dvd_of_not_dvd (Ideal.dvd_iff_le.mpr (le_of_lt h)) (mt Ideal.dvd_iff_le.mp (not_le_of_lt h))⟩ instance : WfDvdMonoid (Ideal A) where wf := by have : WellFoundedGT (Ideal A) := inferInstance convert this.wf ext rw [Ideal.dvdNotUnit_iff_lt] instance Ideal.uniqueFactorizationMonoid : UniqueFactorizationMonoid (Ideal A) := { irreducible_iff_prime := by intro P exact ⟨fun hirr => ⟨hirr.ne_zero, hirr.not_isUnit, fun I J => by have : P.IsMaximal := by refine ⟨⟨mt Ideal.isUnit_iff.mpr hirr.not_isUnit, ?_⟩⟩ intro J hJ obtain ⟨_J_ne, H, hunit, P_eq⟩ := Ideal.dvdNotUnit_iff_lt.mpr hJ exact Ideal.isUnit_iff.mp ((hirr.isUnit_or_isUnit P_eq).resolve_right hunit) rw [Ideal.dvd_iff_le, Ideal.dvd_iff_le, Ideal.dvd_iff_le, SetLike.le_def, SetLike.le_def, SetLike.le_def] contrapose! rintro ⟨⟨x, x_mem, x_not_mem⟩, ⟨y, y_mem, y_not_mem⟩⟩ exact ⟨x * y, Ideal.mul_mem_mul x_mem y_mem, mt this.isPrime.mem_or_mem (not_or_intro x_not_mem y_not_mem)⟩⟩, Prime.irreducible⟩ } instance Ideal.normalizationMonoid : NormalizationMonoid (Ideal A) := .ofUniqueUnits @[simp] theorem Ideal.dvd_span_singleton {I : Ideal A} {x : A} : I ∣ Ideal.span {x} ↔ x ∈ I := Ideal.dvd_iff_le.trans (Ideal.span_le.trans Set.singleton_subset_iff) theorem Ideal.isPrime_of_prime {P : Ideal A} (h : Prime P) : IsPrime P := by refine ⟨?_, fun hxy => ?_⟩ · rintro rfl rw [← Ideal.one_eq_top] at h exact h.not_unit isUnit_one · simp only [← Ideal.dvd_span_singleton, ← Ideal.span_singleton_mul_span_singleton] at hxy ⊢ exact h.dvd_or_dvd hxy theorem Ideal.prime_of_isPrime {P : Ideal A} (hP : P ≠ ⊥) (h : IsPrime P) : Prime P := by refine ⟨hP, mt Ideal.isUnit_iff.mp h.ne_top, fun I J hIJ => ?_⟩ simpa only [Ideal.dvd_iff_le] using h.mul_le.mp (Ideal.le_of_dvd hIJ) /-- In a Dedekind domain, the (nonzero) prime elements of the monoid with zero `Ideal A` are exactly the prime ideals. -/ theorem Ideal.prime_iff_isPrime {P : Ideal A} (hP : P ≠ ⊥) : Prime P ↔ IsPrime P := ⟨Ideal.isPrime_of_prime, Ideal.prime_of_isPrime hP⟩ /-- In a Dedekind domain, the prime ideals are the zero ideal together with the prime elements of the monoid with zero `Ideal A`. -/ theorem Ideal.isPrime_iff_bot_or_prime {P : Ideal A} : IsPrime P ↔ P = ⊥ ∨ Prime P := ⟨fun hp => (eq_or_ne P ⊥).imp_right fun hp0 => Ideal.prime_of_isPrime hp0 hp, fun hp => hp.elim (fun h => h.symm ▸ Ideal.bot_prime) Ideal.isPrime_of_prime⟩ @[simp] theorem Ideal.prime_span_singleton_iff {a : A} : Prime (Ideal.span {a}) ↔ Prime a := by rcases eq_or_ne a 0 with rfl \| ha · rw [Set.singleton_zero, span_zero, ← Ideal.zero_eq_bot, ← not_iff_not] simp only [not_prime_zero, not_false_eq_true] · have ha' : span {a} ≠ ⊥ := by simpa only [ne_eq, span_singleton_eq_bot] using ha rw [Ideal.prime_iff_isPrime ha', Ideal.span_singleton_prime ha] open Submodule.IsPrincipal in theorem Ideal.prime_generator_of_prime {P : Ideal A} (h : Prime P) [P.IsPrincipal] : Prime (generator P) := have : Ideal.IsPrime P := Ideal.isPrime_of_prime h prime_generator_of_isPrime _ h.ne_zero open UniqueFactorizationMonoid in nonrec theorem Ideal.mem_normalizedFactors_iff {p I : Ideal A} (hI : I ≠ ⊥) : p ∈ normalizedFactors I ↔ p.IsPrime ∧ I ≤ p := by rw [← Ideal.dvd_iff_le] by_cases hp : p = 0 · rw [← zero_eq_bot] at hI simp only [hp, zero_not_mem_normalizedFactors, zero_dvd_iff, hI, false_iff, not_and, not_false_eq_true, implies_true] · rwa [mem_normalizedFactors_iff hI, prime_iff_isPrime] theorem Ideal.pow_right_strictAnti (I : Ideal A) (hI0 : I ≠ ⊥) (hI1 : I ≠ ⊤) : StrictAnti (I ^ · : ℕ → Ideal A) := strictAnti_nat_of_succ_lt fun e => Ideal.dvdNotUnit_iff_lt.mp ⟨pow_ne_zero _ hI0, I, mt isUnit_iff.mp hI1, pow_succ I e⟩ theorem Ideal.pow_lt_self (I : Ideal A) (hI0 : I ≠ ⊥) (hI1 : I ≠ ⊤) (e : ℕ) (he : 2 ≤ e) : I ^ e < I := by convert I.pow_right_strictAnti hI0 hI1 he dsimp only rw [pow_one] theorem Ideal.exists_mem_pow_not_mem_pow_succ (I : Ideal A) (hI0 : I ≠ ⊥) (hI1 : I ≠ ⊤) (e : ℕ) : ∃ x ∈ I ^ e, x ∉ I ^ (e + 1) := SetLike.exists_of_lt (I.pow_right_strictAnti hI0 hI1 e.lt_succ_self) open UniqueFactorizationMonoid theorem Ideal.eq_prime_pow_of_succ_lt_of_le {P I : Ideal A} [P_prime : P.IsPrime] (hP : P ≠ ⊥) {i : ℕ} (hlt : P ^ (i + 1) < I) (hle : I ≤ P ^ i) : I = P ^ i := by refine le_antisymm hle ?_ have P_prime' := Ideal.prime_of_isPrime hP P_prime have h1 : I ≠ ⊥ := (lt_of_le_of_lt bot_le hlt).ne' have := pow_ne_zero i hP have h3 := pow_ne_zero (i + 1) hP rw [← Ideal.dvdNotUnit_iff_lt, dvdNotUnit_iff_normalizedFactors_lt_normalizedFactors h1 h3, normalizedFactors_pow, normalizedFactors_irreducible P_prime'.irreducible, Multiset.nsmul_singleton, Multiset.lt_replicate_succ] at hlt rw [← Ideal.dvd_iff_le, dvd_iff_normalizedFactors_le_normalizedFactors, normalizedFactors_pow, normalizedFactors_irreducible P_prime'.irreducible, Multiset.nsmul_singleton] all_goals assumption theorem Ideal.pow_succ_lt_pow {P : Ideal A} [P_prime : P.IsPrime] (hP : P ≠ ⊥) (i : ℕ) : P ^ (i + 1) < P ^ i := lt_of_le_of_ne (Ideal.pow_le_pow_right (Nat.le_succ _)) (mt (pow_inj_of_not_isUnit (mt Ideal.isUnit_iff.mp P_prime.ne_top) hP).mp i.succ_ne_self) theorem Associates.le_singleton_iff (x : A) (n : ℕ) (I : Ideal A) : Associates.mk I ^ n ≤ Associates.mk (Ideal.span {x}) ↔ x ∈ I ^ n := by simp_rw [← Associates.dvd_eq_le, ← Associates.mk_pow, Associates.mk_dvd_mk, Ideal.dvd_span_singleton] variable {K} lemma FractionalIdeal.le_inv_comm {I J : FractionalIdeal A⁰ K} (hI : I ≠ 0) (hJ : J ≠ 0) : I ≤ J⁻¹ ↔ J ≤ I⁻¹ := by rw [inv_eq, inv_eq, le_div_iff_mul_le hI, le_div_iff_mul_le hJ, mul_comm] lemma FractionalIdeal.inv_le_comm {I J : FractionalIdeal A⁰ K} (hI : I ≠ 0) (hJ : J ≠ 0) : I⁻¹ ≤ J ↔ J⁻¹ ≤ I := by simpa using le_inv_comm (A := A) (K := K) (inv_ne_zero hI) (inv_ne_zero hJ) open FractionalIdeal /-- Strengthening of `IsLocalization.exist_integer_multiples`: Let `J ≠ ⊤` be an ideal in a Dedekind domain `A`, and `f ≠ 0` a finite collection of elements of `K = Frac(A)`, then we can multiply the elements of `f` by some `a : K` to find a collection of elements of `A` that is not completely contained in `J`. -/ theorem Ideal.exist_integer_multiples_not_mem {J : Ideal A} (hJ : J ≠ ⊤) {ι : Type} (s : Finset ι) (f : ι → K) {j} (hjs : j ∈ s) (hjf : f j ≠ 0) : ∃ a : K, (∀ i ∈ s, IsLocalization.IsInteger A (a f i)) ∧ ∃ i ∈ s, a * f i ∉ (J : FractionalIdeal A⁰ K) := by -- Consider the fractional ideal `I` spanned by the `f`s. let I : FractionalIdeal A⁰ K := spanFinset A s f have hI0 : I ≠ 0 := spanFinset_ne_zero.mpr ⟨j, hjs, hjf⟩ -- We claim the multiplier `a` we're looking for is in `I⁻¹ \ (J / I)`. suffices ↑J / I < I⁻¹ by obtain ⟨_, a, hI, hpI⟩ := SetLike.lt_iff_le_and_exists.mp this rw [mem_inv_iff hI0] at hI refine ⟨a, fun i hi => ?_, ?_⟩ -- By definition, `a ∈ I⁻¹` multiplies elements of `I` into elements of `1`, -- in other words, `a * f i` is an integer. · exact (mem_one_iff _).mp (hI (f i) (Submodule.subset_span (Set.mem_image_of_mem f hi))) · contrapose! hpI -- And if all `a`-multiples of `I` are an element of `J`, -- then `a` is actually an element of `J / I`, contradiction. refine (mem_div_iff_of_nonzero hI0).mpr fun y hy => Submodule.span_induction ?_ ?_ ?_ ?_ hy · rintro _ ⟨i, hi, rfl⟩; exact hpI i hi · rw [mul_zero]; exact Submodule.zero_mem _ · intro x y _ _ hx hy; rw [mul_add]; exact Submodule.add_mem _ hx hy · intro b x _ hx; rw [mul_smul_comm]; exact Submodule.smul_mem _ b hx -- To show the inclusion of `J / I` into `I⁻¹ = 1 / I`, note that `J < I`. calc ↑J / I = ↑J * I⁻¹ := div_eq_mul_inv (↑J) I _ < 1 * I⁻¹ := mul_right_strictMono (inv_ne_zero hI0) ?_ _ = I⁻¹ := one_mul _ rw [← coeIdeal_top] -- And multiplying by `I⁻¹` is indeed strictly monotone. exact strictMono_of_le_iff_le (fun _ _ => (coeIdeal_le_coeIdeal K).symm) (lt_top_iff_ne_top.mpr hJ) section Gcd namespace Ideal /-! ### GCD and LCM of ideals in a Dedekind domain We show that the gcd of two ideals in a Dedekind domain is just their supremum, and the lcm is their infimum, and use this to instantiate `NormalizedGCDMonoid (Ideal A)`. -/ @[simp] theorem sup_mul_inf (I J : Ideal A) : (I ⊔ J) * (I ⊓ J) = I * J := by letI := UniqueFactorizationMonoid.toNormalizedGCDMonoid (Ideal A) have hgcd : gcd I J = I ⊔ J := by rw [gcd_eq_normalize _ _, normalize_eq] · rw [dvd_iff_le, sup_le_iff, ← dvd_iff_le, ← dvd_iff_le] exact ⟨gcd_dvd_left _ _, gcd_dvd_right _ _⟩ · rw [dvd_gcd_iff, dvd_iff_le, dvd_iff_le] simp have hlcm : lcm I J = I ⊓ J := by rw [lcm_eq_normalize _ _, normalize_eq] · rw [lcm_dvd_iff, dvd_iff_le, dvd_iff_le] simp · rw [dvd_iff_le, le_inf_iff, ← dvd_iff_le, ← dvd_iff_le] exact ⟨dvd_lcm_left _ _, dvd_lcm_right _ _⟩ rw [← hgcd, ← hlcm, associated_iff_eq.mp (gcd_mul_lcm _ _)] /-- Ideals in a Dedekind domain have gcd and lcm operators that (trivially) are compatible with the normalization operator. -/ instance : NormalizedGCDMonoid (Ideal A) := { Ideal.normalizationMonoid with gcd := (· ⊔ ·) gcd_dvd_left := fun _ _ => by simpa only [dvd_iff_le] using le_sup_left gcd_dvd_right := fun _ _ => by simpa only [dvd_iff_le] using le_sup_right dvd_gcd := by simp only [dvd_iff_le] exact fun h1 h2 => @sup_le (Ideal A) _ _ _ _ h1 h2 lcm := (· ⊓ ·) lcm_zero_left := fun _ => by simp only [zero_eq_bot, bot_inf_eq] lcm_zero_right := fun _ => by simp only [zero_eq_bot, inf_bot_eq] gcd_mul_lcm := fun _ _ => by rw [associated_iff_eq, sup_mul_inf] normalize_gcd := fun _ _ => normalize_eq _ normalize_lcm := fun _ _ => normalize_eq _ } -- In fact, any lawful gcd and lcm would equal sup and inf respectively. @[simp] theorem gcd_eq_sup (I J : Ideal A) : gcd I J = I ⊔ J := rfl @[simp] theorem lcm_eq_inf (I J : Ideal A) : lcm I J = I ⊓ J := rfl theorem isCoprime_iff_gcd {I J : Ideal A} : IsCoprime I J ↔ gcd I J = 1 := by rw [Ideal.isCoprime_iff_codisjoint, codisjoint_iff, one_eq_top, gcd_eq_sup] theorem factors_span_eq {p : K[X]} : factors (span {p}) = (factors p).map (fun q ↦ span {q}) := by rcases eq_or_ne p 0 with rfl \| hp; · simpa [Set.singleton_zero] using normalizedFactors_zero have : ∀ q ∈ (factors p).map (fun q ↦ span {q}), Prime q := fun q hq ↦ by obtain ⟨r, hr, rfl⟩ := Multiset.mem_map.mp hq exact prime_span_singleton_iff.mpr <\| prime_of_factor r hr rw [← span_singleton_eq_span_singleton.mpr (factors_prod hp), ← multiset_prod_span_singleton, factors_eq_normalizedFactors, normalizedFactors_prod_of_prime this] end Ideal end Gcd end IsDedekindDomain section IsDedekindDomain variable {T : Type} [CommRing T] [IsDedekindDomain T] {I J : Ideal T} open Multiset UniqueFactorizationMonoid Ideal theorem prod_normalizedFactors_eq_self (hI : I ≠ ⊥) : (normalizedFactors I).prod = I := associated_iff_eq.1 (prod_normalizedFactors hI) theorem count_le_of_ideal_ge [DecidableEq (Ideal T)] {I J : Ideal T} (h : I ≤ J) (hI : I ≠ ⊥) (K : Ideal T) : count K (normalizedFactors J) ≤ count K (normalizedFactors I) := le_iff_count.1 ((dvd_iff_normalizedFactors_le_normalizedFactors (ne_bot_of_le_ne_bot hI h) hI).1 (dvd_iff_le.2 h)) _ theorem sup_eq_prod_inf_factors [DecidableEq (Ideal T)] (hI : I ≠ ⊥) (hJ : J ≠ ⊥) : I ⊔ J = (normalizedFactors I ∩ normalizedFactors J).prod := by have H : normalizedFactors (normalizedFactors I ∩ normalizedFactors J).prod = normalizedFactors I ∩ normalizedFactors J := by apply normalizedFactors_prod_of_prime intro p hp rw [mem_inter] at hp exact prime_of_normalized_factor p hp.left have := Multiset.prod_ne_zero_of_prime (normalizedFactors I ∩ normalizedFactors J) fun _ h => prime_of_normalized_factor _ (Multiset.mem_inter.1 h).1 apply le_antisymm · rw [sup_le_iff, ← dvd_iff_le, ← dvd_iff_le] constructor · rw [dvd_iff_normalizedFactors_le_normalizedFactors this hI, H] exact inf_le_left · rw [dvd_iff_normalizedFactors_le_normalizedFactors this hJ, H] exact inf_le_right · rw [← dvd_iff_le, dvd_iff_normalizedFactors_le_normalizedFactors, normalizedFactors_prod_of_prime, le_iff_count] · intro a rw [Multiset.count_inter] exact le_min (count_le_of_ideal_ge le_sup_left hI a) (count_le_of_ideal_ge le_sup_right hJ a) · intro p hp rw [mem_inter] at hp exact prime_of_normalized_factor p hp.left · exact ne_bot_of_le_ne_bot hI le_sup_left · exact this theorem irreducible_pow_sup [DecidableEq (Ideal T)] (hI : I ≠ ⊥) (hJ : Irreducible J) (n : ℕ) : J ^ n ⊔ I = J ^ min ((normalizedFactors I).count J) n := by rw [sup_eq_prod_inf_factors (pow_ne_zero n hJ.ne_zero) hI, min_comm, normalizedFactors_of_irreducible_pow hJ, normalize_eq J, replicate_inter, prod_replicate] theorem irreducible_pow_sup_of_le (hJ : Irreducible J) (n : ℕ) (hn : n ≤ emultiplicity J I) : J ^ n ⊔ I = J ^ n := by classical by_cases hI : I = ⊥ · simp_all rw [irreducible_pow_sup hI hJ, min_eq_right] rw [emultiplicity_eq_count_normalizedFactors hJ hI, normalize_eq J] at hn exact_mod_cast hn theorem irreducible_pow_sup_of_ge (hI : I ≠ ⊥) (hJ : Irreducible J) (n : ℕ) (hn : emultiplicity J I ≤ n) : J ^ n ⊔ I = J ^ multiplicity J I := by classical rw [irreducible_pow_sup hI hJ, min_eq_left] · congr rw [← Nat.cast_inj (R := ℕ∞), ← FiniteMultiplicity.emultiplicity_eq_multiplicity, emultiplicity_eq_count_normalizedFactors hJ hI, normalize_eq J] rw [← emultiplicity_lt_top] apply hn.trans_lt simp · rw [emultiplicity_eq_count_normalizedFactors hJ hI, normalize_eq J] at hn exact_mod_cast hn theorem Ideal.eq_prime_pow_mul_coprime [DecidableEq (Ideal T)] {I : Ideal T} (hI : I ≠ ⊥) (P : Ideal T) [hpm : P.IsMaximal] : ∃ Q : Ideal T, P ⊔ Q = ⊤ ∧ I = P ^ (Multiset.count P (normalizedFactors I)) Q := by use (filter (¬ P = ·) (normalizedFactors I)).prod constructor · refine P.sup_multiset_prod_eq_top (fun p hpi ↦ ?_) have hp : Prime p := prime_of_normalized_factor p (filter_subset _ (normalizedFactors I) hpi) exact hpm.coprime_of_ne ((isPrime_of_prime hp).isMaximal hp.ne_zero) (of_mem_filter hpi) · nth_rw 1 [← prod_normalizedFactors_eq_self hI, ← filter_add_not (P = ·) (normalizedFactors I)] rw [prod_add, pow_count] end IsDedekindDomain	/-! ### Height one spectrum of a Dedekind domain If `R` is a Dedekind domain of Krull dimension 1, the maximal ideals of `R` are exactly its nonzero prime ideals. We define `HeightOneSpectrum` and provide lemmas to recover the facts that prime ideals of height one are prime and irreducible. -/ namespace IsDedekindDomain variable [IsDedekindDomain R] /-- The height one prime spectrum of a Dedekind domain `R` is the type of nonzero prime ideals of `R`. Note that this equals the maximal spectrum if `R` has Krull dimension 1. -/ @[ext, nolint unusedArguments] structure HeightOneSpectrum where asIdeal : Ideal R isPrime : asIdeal.IsPrime ne_bot : asIdeal ≠ ⊥ attribute [instance] HeightOneSpectrum.isPrime variable (v : HeightOneSpectrum R) {R} namespace HeightOneSpectrum	Mathlib/RingTheory/DedekindDomain/Ideal.lean	941	967
/- 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	1,335	1,337
/- Copyright (c) 2018 Andreas Swerdlow. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Andreas Swerdlow -/ import Mathlib.LinearAlgebra.Basis.Basic import Mathlib.LinearAlgebra.BilinearMap import Mathlib.LinearAlgebra.LinearIndependent.Lemmas /-! # Sesquilinear maps This files provides properties about sesquilinear maps and forms. The maps considered are of the form `M₁ →ₛₗ[I₁] M₂ →ₛₗ[I₂] M`, where `I₁ : R₁ →+* R` and `I₂ : R₂ →+* R` are ring homomorphisms and `M₁` is a module over `R₁`, `M₂` is a module over `R₂` and `M` is a module over `R`. Sesquilinear forms are the special case that `M₁ = M₂`, `M = R₁ = R₂ = R`, and `I₁ = RingHom.id R`. Taking additionally `I₂ = RingHom.id R`, then one obtains bilinear forms. Sesquilinear maps are a special case of the bilinear maps defined in `BilinearMap.lean` and `many` basic lemmas about construction and elementary calculations are found there. ## Main declarations * `IsOrtho`: states that two vectors are orthogonal with respect to a sesquilinear map * `IsSymm`, `IsAlt`: states that a sesquilinear form is symmetric and alternating, respectively * `orthogonalBilin`: provides the orthogonal complement with respect to sesquilinear form ## References * <https://en.wikipedia.org/wiki/Sesquilinear_form#Over_arbitrary_rings> ## Tags Sesquilinear form, Sesquilinear map, -/ variable {R R₁ R₂ R₃ M M₁ M₂ M₃ Mₗ₁ Mₗ₁' Mₗ₂ Mₗ₂' K K₁ K₂ V V₁ V₂ n : Type} namespace LinearMap /-! ### Orthogonal vectors -/ section CommRing -- the `ₗ` subscript variables are for special cases about linear (as opposed to semilinear) maps variable [CommSemiring R] [CommSemiring R₁] [AddCommMonoid M₁] [Module R₁ M₁] [CommSemiring R₂] [AddCommMonoid M₂] [Module R₂ M₂] [AddCommMonoid M] [Module R M] {I₁ : R₁ →+ R} {I₂ : R₂ →+* R} {I₁' : R₁ →+* R} /-- The proposition that two elements of a sesquilinear map space are orthogonal -/ def IsOrtho (B : M₁ →ₛₗ[I₁] M₂ →ₛₗ[I₂] M) (x : M₁) (y : M₂) : Prop := B x y = 0 theorem isOrtho_def {B : M₁ →ₛₗ[I₁] M₂ →ₛₗ[I₂] M} {x y} : B.IsOrtho x y ↔ B x y = 0 := Iff.rfl theorem isOrtho_zero_left (B : M₁ →ₛₗ[I₁] M₂ →ₛₗ[I₂] M) (x) : IsOrtho B (0 : M₁) x := by dsimp only [IsOrtho] rw [map_zero B, zero_apply] theorem isOrtho_zero_right (B : M₁ →ₛₗ[I₁] M₂ →ₛₗ[I₂] M) (x) : IsOrtho B x (0 : M₂) := map_zero (B x) theorem isOrtho_flip {B : M₁ →ₛₗ[I₁] M₁ →ₛₗ[I₁'] M} {x y} : B.IsOrtho x y ↔ B.flip.IsOrtho y x := by simp_rw [isOrtho_def, flip_apply] open scoped Function in -- required for scoped `on` notation /-- A set of vectors `v` is orthogonal with respect to some bilinear map `B` if and only	if for all `i ≠ j`, `B (v i) (v j) = 0`. For orthogonality between two elements, use `BilinForm.isOrtho` -/	Mathlib/LinearAlgebra/SesquilinearForm.lean	71	72
/- Copyright (c) 2020 Sébastien Gouëzel. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Sébastien Gouëzel, Floris van Doorn -/ import Mathlib.Geometry.Manifold.IsManifold.ExtChartAt import Mathlib.Geometry.Manifold.LocalInvariantProperties /-! # `C^n` functions between manifolds We define `Cⁿ` functions between manifolds, as functions which are `Cⁿ` in charts, and prove basic properties of these notions. Here, `n` can be finite, or `∞`, or `ω`. ## Main definitions and statements Let `M` and `M'` be two manifolds, with respect to models with corners `I` and `I'`. Let `f : M → M'`. * `ContMDiffWithinAt I I' n f s x` states that the function `f` is `Cⁿ` within the set `s` around the point `x`. * `ContMDiffAt I I' n f x` states that the function `f` is `Cⁿ` around `x`. * `ContMDiffOn I I' n f s` states that the function `f` is `Cⁿ` on the set `s` * `ContMDiff I I' n f` states that the function `f` is `Cⁿ`. We also give some basic properties of `Cⁿ` functions between manifolds, following the API of `C^n` functions between vector spaces. See `Basic.lean` for further basic properties of `Cⁿ` functions between manifolds, `NormedSpace.lean` for the equivalence of manifold-smoothness to usual smoothness, `Product.lean` for smoothness results related to the product of manifolds and `Atlas.lean` for smoothness of atlas members and local structomorphisms. ## Implementation details Many properties follow for free from the corresponding properties of functions in vector spaces, as being `Cⁿ` is a local property invariant under the `Cⁿ` groupoid. We take advantage of the general machinery developed in `LocalInvariantProperties.lean` to get these properties automatically. For instance, the fact that being `Cⁿ` does not depend on the chart one considers is given by `liftPropWithinAt_indep_chart`. For this to work, the definition of `ContMDiffWithinAt` and friends has to follow definitionally the setup of local invariant properties. Still, we recast the definition in terms of extended charts in `contMDiffOn_iff` and `contMDiff_iff`. -/ open Set Function Filter ChartedSpace IsManifold open scoped Topology Manifold ContDiff /-! ### Definition of `Cⁿ` functions between manifolds -/ variable {𝕜 : Type} [NontriviallyNormedField 𝕜] -- Prerequisite typeclasses to say that `M` is a manifold over the pair `(E, H)` {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {H : Type} [TopologicalSpace H] {I : ModelWithCorners 𝕜 E H} {M : Type} [TopologicalSpace M] [ChartedSpace H M] -- Prerequisite typeclasses to say that `M'` is a manifold over the pair `(E', H')` {E' : Type} [NormedAddCommGroup E'] [NormedSpace 𝕜 E'] {H' : Type} [TopologicalSpace H'] {I' : ModelWithCorners 𝕜 E' H'} {M' : Type} [TopologicalSpace M'] [ChartedSpace H' M'] -- Prerequisite typeclasses to say that `M''` is a manifold over the pair `(E'', H'')` {E'' : Type} [NormedAddCommGroup E''] [NormedSpace 𝕜 E''] {H'' : Type} [TopologicalSpace H''] {I'' : ModelWithCorners 𝕜 E'' H''} {M'' : Type} [TopologicalSpace M''] [ChartedSpace H'' M''] -- declare functions, sets, points and smoothness indices {e : PartialHomeomorph M H} {e' : PartialHomeomorph M' H'} {f f₁ : M → M'} {s s₁ t : Set M} {x : M} {m n : WithTop ℕ∞} variable (I I') in /-- Property in the model space of a model with corners of being `C^n` within at set at a point, when read in the model vector space. This property will be lifted to manifolds to define `C^n` functions between manifolds. -/ def ContDiffWithinAtProp (n : WithTop ℕ∞) (f : H → H') (s : Set H) (x : H) : Prop := ContDiffWithinAt 𝕜 n (I' ∘ f ∘ I.symm) (I.symm ⁻¹' s ∩ range I) (I x) theorem contDiffWithinAtProp_self_source {f : E → H'} {s : Set E} {x : E} : ContDiffWithinAtProp 𝓘(𝕜, E) I' n f s x ↔ ContDiffWithinAt 𝕜 n (I' ∘ f) s x := by simp_rw [ContDiffWithinAtProp, modelWithCornersSelf_coe, range_id, inter_univ, modelWithCornersSelf_coe_symm, CompTriple.comp_eq, preimage_id_eq, id_eq] theorem contDiffWithinAtProp_self {f : E → E'} {s : Set E} {x : E} : ContDiffWithinAtProp 𝓘(𝕜, E) 𝓘(𝕜, E') n f s x ↔ ContDiffWithinAt 𝕜 n f s x := contDiffWithinAtProp_self_source theorem contDiffWithinAtProp_self_target {f : H → E'} {s : Set H} {x : H} : ContDiffWithinAtProp I 𝓘(𝕜, E') n f s x ↔ ContDiffWithinAt 𝕜 n (f ∘ I.symm) (I.symm ⁻¹' s ∩ range I) (I x) := Iff.rfl /-- Being `Cⁿ` in the model space is a local property, invariant under `Cⁿ` maps. Therefore, it lifts nicely to manifolds. -/ theorem contDiffWithinAt_localInvariantProp_of_le (n m : WithTop ℕ∞) (hmn : m ≤ n) : (contDiffGroupoid n I).LocalInvariantProp (contDiffGroupoid n I') (ContDiffWithinAtProp I I' m) where is_local {s x u f} u_open xu := by have : I.symm ⁻¹' (s ∩ u) ∩ range I = I.symm ⁻¹' s ∩ range I ∩ I.symm ⁻¹' u := by simp only [inter_right_comm, preimage_inter] rw [ContDiffWithinAtProp, ContDiffWithinAtProp, this] symm apply contDiffWithinAt_inter have : u ∈ 𝓝 (I.symm (I x)) := by rw [ModelWithCorners.left_inv] exact u_open.mem_nhds xu apply ContinuousAt.preimage_mem_nhds I.continuous_symm.continuousAt this right_invariance' {s x f e} he hx h := by rw [ContDiffWithinAtProp] at h ⊢ have : I x = (I ∘ e.symm ∘ I.symm) (I (e x)) := by simp only [hx, mfld_simps] rw [this] at h have : I (e x) ∈ I.symm ⁻¹' e.target ∩ range I := by simp only [hx, mfld_simps] have := (mem_groupoid_of_pregroupoid.2 he).2.contDiffWithinAt this convert (h.comp_inter _ (this.of_le hmn)).mono_of_mem_nhdsWithin _ using 1 · ext y; simp only [mfld_simps] refine mem_nhdsWithin.mpr ⟨I.symm ⁻¹' e.target, e.open_target.preimage I.continuous_symm, by simp_rw [mem_preimage, I.left_inv, e.mapsTo hx], ?_⟩ mfld_set_tac congr_of_forall {s x f g} h hx hf := by apply hf.congr · intro y hy simp only [mfld_simps] at hy simp only [h, hy, mfld_simps] · simp only [hx, mfld_simps] left_invariance' {s x f e'} he' hs hx h := by rw [ContDiffWithinAtProp] at h ⊢ have A : (I' ∘ f ∘ I.symm) (I x) ∈ I'.symm ⁻¹' e'.source ∩ range I' := by simp only [hx, mfld_simps] have := (mem_groupoid_of_pregroupoid.2 he').1.contDiffWithinAt A convert (this.of_le hmn).comp _ h _ · ext y; simp only [mfld_simps] · intro y hy; simp only [mfld_simps] at hy; simpa only [hy, mfld_simps] using hs hy.1 /-- Being `Cⁿ` in the model space is a local property, invariant under `C^n` maps. Therefore, it lifts nicely to manifolds. -/ theorem contDiffWithinAt_localInvariantProp (n : WithTop ℕ∞) : (contDiffGroupoid n I).LocalInvariantProp (contDiffGroupoid n I') (ContDiffWithinAtProp I I' n) := contDiffWithinAt_localInvariantProp_of_le n n le_rfl theorem contDiffWithinAtProp_mono_of_mem_nhdsWithin (n : WithTop ℕ∞) ⦃s x t⦄ ⦃f : H → H'⦄ (hts : s ∈ 𝓝[t] x) (h : ContDiffWithinAtProp I I' n f s x) : ContDiffWithinAtProp I I' n f t x := by refine h.mono_of_mem_nhdsWithin ?_ refine inter_mem ?_ (mem_of_superset self_mem_nhdsWithin inter_subset_right) rwa [← Filter.mem_map, ← I.image_eq, I.symm_map_nhdsWithin_image] @[deprecated (since := "2024-10-31")] alias contDiffWithinAtProp_mono_of_mem := contDiffWithinAtProp_mono_of_mem_nhdsWithin theorem contDiffWithinAtProp_id (x : H) : ContDiffWithinAtProp I I n id univ x := by simp only [ContDiffWithinAtProp, id_comp, preimage_univ, univ_inter] have : ContDiffWithinAt 𝕜 n id (range I) (I x) := contDiff_id.contDiffAt.contDiffWithinAt refine this.congr (fun y hy => ?_) ?_ · simp only [ModelWithCorners.right_inv I hy, mfld_simps] · simp only [mfld_simps] variable (I I') in /-- A function is `n` times continuously differentiable within a set at a point in a manifold if it is continuous and it is `n` times continuously differentiable in this set around this point, when read in the preferred chart at this point. -/ def ContMDiffWithinAt (n : WithTop ℕ∞) (f : M → M') (s : Set M) (x : M) := LiftPropWithinAt (ContDiffWithinAtProp I I' n) f s x @[deprecated (since := "2024-11-21")] alias SmoothWithinAt := ContMDiffWithinAt variable (I I') in /-- A function is `n` times continuously differentiable at a point in a manifold if it is continuous and it is `n` times continuously differentiable around this point, when read in the preferred chart at this point. -/ def ContMDiffAt (n : WithTop ℕ∞) (f : M → M') (x : M) := ContMDiffWithinAt I I' n f univ x theorem contMDiffAt_iff {n : WithTop ℕ∞} {f : M → M'} {x : M} : ContMDiffAt I I' n f x ↔ ContinuousAt f x ∧ ContDiffWithinAt 𝕜 n (extChartAt I' (f x) ∘ f ∘ (extChartAt I x).symm) (range I) (extChartAt I x x) := liftPropAt_iff.trans <\| by rw [ContDiffWithinAtProp, preimage_univ, univ_inter]; rfl @[deprecated (since := "2024-11-21")] alias SmoothAt := ContMDiffAt variable (I I') in /-- A function is `n` times continuously differentiable in a set of a manifold if it is continuous and, for any pair of points, it is `n` times continuously differentiable on this set in the charts around these points. -/ def ContMDiffOn (n : WithTop ℕ∞) (f : M → M') (s : Set M) := ∀ x ∈ s, ContMDiffWithinAt I I' n f s x @[deprecated (since := "2024-11-21")] alias SmoothOn := ContMDiffOn variable (I I') in /-- A function is `n` times continuously differentiable in a manifold if it is continuous and, for any pair of points, it is `n` times continuously differentiable in the charts around these points. -/ def ContMDiff (n : WithTop ℕ∞) (f : M → M') := ∀ x, ContMDiffAt I I' n f x @[deprecated (since := "2024-11-21")] alias Smooth := ContMDiff /-! ### Deducing smoothness from higher smoothness -/ theorem ContMDiffWithinAt.of_le (hf : ContMDiffWithinAt I I' n f s x) (le : m ≤ n) : ContMDiffWithinAt I I' m f s x := by simp only [ContMDiffWithinAt, LiftPropWithinAt] at hf ⊢ exact ⟨hf.1, hf.2.of_le (mod_cast le)⟩ theorem ContMDiffAt.of_le (hf : ContMDiffAt I I' n f x) (le : m ≤ n) : ContMDiffAt I I' m f x := ContMDiffWithinAt.of_le hf le theorem ContMDiffOn.of_le (hf : ContMDiffOn I I' n f s) (le : m ≤ n) : ContMDiffOn I I' m f s := fun x hx => (hf x hx).of_le le theorem ContMDiff.of_le (hf : ContMDiff I I' n f) (le : m ≤ n) : ContMDiff I I' m f := fun x => (hf x).of_le le /-! ### Basic properties of `C^n` functions between manifolds -/ @[deprecated (since := "2024-11-20")] alias ContMDiff.smooth := ContMDiff.of_le @[deprecated (since := "2024-11-20")] alias Smooth.contMDiff := ContMDiff.of_le @[deprecated (since := "2024-11-20")] alias ContMDiffOn.smoothOn := ContMDiffOn.of_le @[deprecated (since := "2024-11-20")] alias SmoothOn.contMDiffOn := ContMDiffOn.of_le @[deprecated (since := "2024-11-20")] alias ContMDiffAt.smoothAt := ContMDiffAt.of_le @[deprecated (since := "2024-11-20")] alias SmoothAt.contMDiffAt := ContMDiffOn.of_le @[deprecated (since := "2024-11-20")] alias ContMDiffWithinAt.smoothWithinAt := ContMDiffWithinAt.of_le @[deprecated (since := "2024-11-20")] alias SmoothWithinAt.contMDiffWithinAt := ContMDiffWithinAt.of_le theorem ContMDiff.contMDiffAt (h : ContMDiff I I' n f) : ContMDiffAt I I' n f x := h x @[deprecated (since := "2024-11-20")] alias Smooth.smoothAt := ContMDiff.contMDiffAt theorem contMDiffWithinAt_univ : ContMDiffWithinAt I I' n f univ x ↔ ContMDiffAt I I' n f x := Iff.rfl @[deprecated (since := "2024-11-20")] alias smoothWithinAt_univ := contMDiffWithinAt_univ theorem contMDiffOn_univ : ContMDiffOn I I' n f univ ↔ ContMDiff I I' n f := by simp only [ContMDiffOn, ContMDiff, contMDiffWithinAt_univ, forall_prop_of_true, mem_univ] @[deprecated (since := "2024-11-20")] alias smoothOn_univ := contMDiffOn_univ /-- One can reformulate being `C^n` within a set at a point as continuity within this set at this point, and being `C^n` in the corresponding extended chart. -/ theorem contMDiffWithinAt_iff : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContDiffWithinAt 𝕜 n (extChartAt I' (f x) ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).symm ⁻¹' s ∩ range I) (extChartAt I x x) := by simp_rw [ContMDiffWithinAt, liftPropWithinAt_iff']; rfl /-- One can reformulate being `Cⁿ` within a set at a point as continuity within this set at this point, and being `Cⁿ` in the corresponding extended chart. This form states regularity of `f` written in such a way that the set is restricted to lie within the domain/codomain of the corresponding charts. Even though this expression is more complicated than the one in `contMDiffWithinAt_iff`, it is a smaller set, but their germs at `extChartAt I x x` are equal. It is sometimes useful to rewrite using this in the goal. -/ theorem contMDiffWithinAt_iff' : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContDiffWithinAt 𝕜 n (extChartAt I' (f x) ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).target ∩ (extChartAt I x).symm ⁻¹' (s ∩ f ⁻¹' (extChartAt I' (f x)).source)) (extChartAt I x x) := by simp only [ContMDiffWithinAt, liftPropWithinAt_iff'] exact and_congr_right fun hc => contDiffWithinAt_congr_set <\| hc.extChartAt_symm_preimage_inter_range_eventuallyEq /-- One can reformulate being `Cⁿ` within a set at a point as continuity within this set at this point, and being `Cⁿ` in the corresponding extended chart in the target. -/ theorem contMDiffWithinAt_iff_target : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContMDiffWithinAt I 𝓘(𝕜, E') n (extChartAt I' (f x) ∘ f) s x := by simp_rw [ContMDiffWithinAt, liftPropWithinAt_iff', ← and_assoc] have cont : ContinuousWithinAt f s x ∧ ContinuousWithinAt (extChartAt I' (f x) ∘ f) s x ↔ ContinuousWithinAt f s x := and_iff_left_of_imp <\| (continuousAt_extChartAt _).comp_continuousWithinAt simp_rw [cont, ContDiffWithinAtProp, extChartAt, PartialHomeomorph.extend, PartialEquiv.coe_trans, ModelWithCorners.toPartialEquiv_coe, PartialHomeomorph.coe_coe, modelWithCornersSelf_coe, chartAt_self_eq, PartialHomeomorph.refl_apply, id_comp] rfl @[deprecated (since := "2024-11-20")] alias smoothWithinAt_iff := contMDiffWithinAt_iff @[deprecated (since := "2024-11-20")] alias smoothWithinAt_iff_target := contMDiffWithinAt_iff_target theorem contMDiffAt_iff_target {x : M} : ContMDiffAt I I' n f x ↔ ContinuousAt f x ∧ ContMDiffAt I 𝓘(𝕜, E') n (extChartAt I' (f x) ∘ f) x := by rw [ContMDiffAt, ContMDiffAt, contMDiffWithinAt_iff_target, continuousWithinAt_univ] @[deprecated (since := "2024-11-20")] alias smoothAt_iff_target := contMDiffAt_iff_target /-- One can reformulate being `Cⁿ` within a set at a point as being `Cⁿ` in the source space when composing with the extended chart. -/ theorem contMDiffWithinAt_iff_source : ContMDiffWithinAt I I' n f s x ↔ ContMDiffWithinAt 𝓘(𝕜, E) I' n (f ∘ (extChartAt I x).symm) ((extChartAt I x).symm ⁻¹' s ∩ range I) (extChartAt I x x) := by simp_rw [ContMDiffWithinAt, liftPropWithinAt_iff'] have : ContinuousWithinAt f s x ↔ ContinuousWithinAt (f ∘ ↑(extChartAt I x).symm) (↑(extChartAt I x).symm ⁻¹' s ∩ range ↑I) (extChartAt I x x) := by refine ⟨fun h ↦ ?_, fun h ↦ ?_⟩ · apply h.comp_of_eq · exact (continuousAt_extChartAt_symm x).continuousWithinAt · exact (mapsTo_preimage _ _).mono_left inter_subset_left · exact extChartAt_to_inv x · rw [← continuousWithinAt_inter (extChartAt_source_mem_nhds (I := I) x)] have : ContinuousWithinAt ((f ∘ ↑(extChartAt I x).symm) ∘ ↑(extChartAt I x)) (s ∩ (extChartAt I x).source) x := by apply h.comp (continuousAt_extChartAt x).continuousWithinAt intro y hy have : (chartAt H x).symm ((chartAt H x) y) = y := PartialHomeomorph.left_inv _ (by simpa using hy.2) simpa [this] using hy.1 apply this.congr · intro y hy have : (chartAt H x).symm ((chartAt H x) y) = y := PartialHomeomorph.left_inv _ (by simpa using hy.2) simp [this] · simp rw [← this] simp only [ContDiffWithinAtProp, mfld_simps, preimage_comp, comp_assoc] /-- One can reformulate being `Cⁿ` at a point as being `Cⁿ` in the source space when composing with the extended chart. -/ theorem contMDiffAt_iff_source : ContMDiffAt I I' n f x ↔ ContMDiffWithinAt 𝓘(𝕜, E) I' n (f ∘ (extChartAt I x).symm) (range I) (extChartAt I x x) := by rw [← contMDiffWithinAt_univ, contMDiffWithinAt_iff_source] simp section IsManifold theorem contMDiffWithinAt_iff_source_of_mem_maximalAtlas [IsManifold I n M] (he : e ∈ maximalAtlas I n M) (hx : x ∈ e.source) : ContMDiffWithinAt I I' n f s x ↔ ContMDiffWithinAt 𝓘(𝕜, E) I' n (f ∘ (e.extend I).symm) ((e.extend I).symm ⁻¹' s ∩ range I) (e.extend I x) := by have h2x := hx; rw [← e.extend_source (I := I)] at h2x simp_rw [ContMDiffWithinAt, (contDiffWithinAt_localInvariantProp n).liftPropWithinAt_indep_chart_source he hx, StructureGroupoid.liftPropWithinAt_self_source, e.extend_symm_continuousWithinAt_comp_right_iff, contDiffWithinAtProp_self_source, ContDiffWithinAtProp, Function.comp, e.left_inv hx, (e.extend I).left_inv h2x] rfl theorem contMDiffWithinAt_iff_source_of_mem_source [IsManifold I n M] {x' : M} (hx' : x' ∈ (chartAt H x).source) : ContMDiffWithinAt I I' n f s x' ↔ ContMDiffWithinAt 𝓘(𝕜, E) I' n (f ∘ (extChartAt I x).symm) ((extChartAt I x).symm ⁻¹' s ∩ range I) (extChartAt I x x') := contMDiffWithinAt_iff_source_of_mem_maximalAtlas (chart_mem_maximalAtlas x) hx' theorem contMDiffAt_iff_source_of_mem_source [IsManifold I n M] {x' : M} (hx' : x' ∈ (chartAt H x).source) : ContMDiffAt I I' n f x' ↔ ContMDiffWithinAt 𝓘(𝕜, E) I' n (f ∘ (extChartAt I x).symm) (range I) (extChartAt I x x') := by simp_rw [ContMDiffAt, contMDiffWithinAt_iff_source_of_mem_source hx', preimage_univ, univ_inter] theorem contMDiffWithinAt_iff_target_of_mem_source [IsManifold I' n M'] {x : M} {y : M'} (hy : f x ∈ (chartAt H' y).source) : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContMDiffWithinAt I 𝓘(𝕜, E') n (extChartAt I' y ∘ f) s x := by simp_rw [ContMDiffWithinAt] rw [(contDiffWithinAt_localInvariantProp n).liftPropWithinAt_indep_chart_target (chart_mem_maximalAtlas y) hy, and_congr_right] intro hf simp_rw [StructureGroupoid.liftPropWithinAt_self_target] simp_rw [((chartAt H' y).continuousAt hy).comp_continuousWithinAt hf] rw [← extChartAt_source (I := I')] at hy simp_rw [(continuousAt_extChartAt' hy).comp_continuousWithinAt hf] rfl theorem contMDiffAt_iff_target_of_mem_source [IsManifold I' n M'] {x : M} {y : M'} (hy : f x ∈ (chartAt H' y).source) : ContMDiffAt I I' n f x ↔ ContinuousAt f x ∧ ContMDiffAt I 𝓘(𝕜, E') n (extChartAt I' y ∘ f) x := by rw [ContMDiffAt, contMDiffWithinAt_iff_target_of_mem_source hy, continuousWithinAt_univ, ContMDiffAt] variable [IsManifold I n M] [IsManifold I' n M'] theorem contMDiffWithinAt_iff_of_mem_maximalAtlas {x : M} (he : e ∈ maximalAtlas I n M) (he' : e' ∈ maximalAtlas I' n M') (hx : x ∈ e.source) (hy : f x ∈ e'.source) : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContDiffWithinAt 𝕜 n (e'.extend I' ∘ f ∘ (e.extend I).symm) ((e.extend I).symm ⁻¹' s ∩ range I) (e.extend I x) := (contDiffWithinAt_localInvariantProp n).liftPropWithinAt_indep_chart he hx he' hy /-- An alternative formulation of `contMDiffWithinAt_iff_of_mem_maximalAtlas` if the set if `s` lies in `e.source`. -/ theorem contMDiffWithinAt_iff_image {x : M} (he : e ∈ maximalAtlas I n M) (he' : e' ∈ maximalAtlas I' n M') (hs : s ⊆ e.source) (hx : x ∈ e.source) (hy : f x ∈ e'.source) : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContDiffWithinAt 𝕜 n (e'.extend I' ∘ f ∘ (e.extend I).symm) (e.extend I '' s) (e.extend I x) := by rw [contMDiffWithinAt_iff_of_mem_maximalAtlas he he' hx hy, and_congr_right_iff] refine fun _ => contDiffWithinAt_congr_set ?_ simp_rw [e.extend_symm_preimage_inter_range_eventuallyEq hs hx] /-- One can reformulate being `C^n` within a set at a point as continuity within this set at this point, and being `C^n` in any chart containing that point. -/ theorem contMDiffWithinAt_iff_of_mem_source {x' : M} {y : M'} (hx : x' ∈ (chartAt H x).source) (hy : f x' ∈ (chartAt H' y).source) : ContMDiffWithinAt I I' n f s x' ↔ ContinuousWithinAt f s x' ∧ ContDiffWithinAt 𝕜 n (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).symm ⁻¹' s ∩ range I) (extChartAt I x x') := contMDiffWithinAt_iff_of_mem_maximalAtlas (chart_mem_maximalAtlas x) (chart_mem_maximalAtlas y) hx hy theorem contMDiffWithinAt_iff_of_mem_source' {x' : M} {y : M'} (hx : x' ∈ (chartAt H x).source) (hy : f x' ∈ (chartAt H' y).source) : ContMDiffWithinAt I I' n f s x' ↔ ContinuousWithinAt f s x' ∧ ContDiffWithinAt 𝕜 n (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).target ∩ (extChartAt I x).symm ⁻¹' (s ∩ f ⁻¹' (extChartAt I' y).source)) (extChartAt I x x') := by refine (contMDiffWithinAt_iff_of_mem_source hx hy).trans ?_ rw [← extChartAt_source I] at hx rw [← extChartAt_source I'] at hy rw [and_congr_right_iff] set e := extChartAt I x; set e' := extChartAt I' (f x) refine fun hc => contDiffWithinAt_congr_set ?_ rw [← nhdsWithin_eq_iff_eventuallyEq, ← e.image_source_inter_eq', ← map_extChartAt_nhdsWithin_eq_image' hx, ← map_extChartAt_nhdsWithin' hx, inter_comm, nhdsWithin_inter_of_mem] exact hc (extChartAt_source_mem_nhds' hy) theorem contMDiffAt_iff_of_mem_source {x' : M} {y : M'} (hx : x' ∈ (chartAt H x).source) (hy : f x' ∈ (chartAt H' y).source) : ContMDiffAt I I' n f x' ↔ ContinuousAt f x' ∧ ContDiffWithinAt 𝕜 n (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) (range I) (extChartAt I x x') := (contMDiffWithinAt_iff_of_mem_source hx hy).trans <\| by rw [continuousWithinAt_univ, preimage_univ, univ_inter] theorem contMDiffOn_iff_of_mem_maximalAtlas (he : e ∈ maximalAtlas I n M) (he' : e' ∈ maximalAtlas I' n M') (hs : s ⊆ e.source) (h2s : MapsTo f s e'.source) : ContMDiffOn I I' n f s ↔ ContinuousOn f s ∧ ContDiffOn 𝕜 n (e'.extend I' ∘ f ∘ (e.extend I).symm) (e.extend I '' s) := by simp_rw [ContinuousOn, ContDiffOn, Set.forall_mem_image, ← forall_and, ContMDiffOn] exact forall₂_congr fun x hx => contMDiffWithinAt_iff_image he he' hs (hs hx) (h2s hx) theorem contMDiffOn_iff_of_mem_maximalAtlas' (he : e ∈ maximalAtlas I n M) (he' : e' ∈ maximalAtlas I' n M') (hs : s ⊆ e.source) (h2s : MapsTo f s e'.source) : ContMDiffOn I I' n f s ↔ ContDiffOn 𝕜 n (e'.extend I' ∘ f ∘ (e.extend I).symm) (e.extend I '' s) := (contMDiffOn_iff_of_mem_maximalAtlas he he' hs h2s).trans <\| and_iff_right_of_imp fun h ↦ (e.continuousOn_writtenInExtend_iff hs h2s).1 h.continuousOn /-- If the set where you want `f` to be `C^n` lies entirely in a single chart, and `f` maps it into a single chart, the fact that `f` is `C^n` on that set can be expressed by purely looking in these charts. Note: this lemma uses `extChartAt I x '' s` instead of `(extChartAt I x).symm ⁻¹' s` to ensure that this set lies in `(extChartAt I x).target`. -/ theorem contMDiffOn_iff_of_subset_source {x : M} {y : M'} (hs : s ⊆ (chartAt H x).source) (h2s : MapsTo f s (chartAt H' y).source) : ContMDiffOn I I' n f s ↔ ContinuousOn f s ∧ ContDiffOn 𝕜 n (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) (extChartAt I x '' s) := contMDiffOn_iff_of_mem_maximalAtlas (chart_mem_maximalAtlas x) (chart_mem_maximalAtlas y) hs h2s /-- If the set where you want `f` to be `C^n` lies entirely in a single chart, and `f` maps it into a single chart, the fact that `f` is `C^n` on that set can be expressed by purely looking in these charts. Note: this lemma uses `extChartAt I x '' s` instead of `(extChartAt I x).symm ⁻¹' s` to ensure that this set lies in `(extChartAt I x).target`. -/ theorem contMDiffOn_iff_of_subset_source' {x : M} {y : M'} (hs : s ⊆ (extChartAt I x).source) (h2s : MapsTo f s (extChartAt I' y).source) : ContMDiffOn I I' n f s ↔ ContDiffOn 𝕜 n (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) (extChartAt I x '' s) := by rw [extChartAt_source] at hs h2s exact contMDiffOn_iff_of_mem_maximalAtlas' (chart_mem_maximalAtlas x) (chart_mem_maximalAtlas y) hs h2s	/-- One can reformulate being `C^n` on a set as continuity on this set, and being `C^n` in any extended chart. -/ theorem contMDiffOn_iff : ContMDiffOn I I' n f s ↔ ContinuousOn f s ∧ ∀ (x : M) (y : M'),	Mathlib/Geometry/Manifold/ContMDiff/Defs.lean	500	506
/- Copyright (c) 2017 Johannes Hölzl. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Johannes Hölzl, Mario Carneiro, Patrick Massot -/ import Mathlib.Algebra.Group.Subgroup.Pointwise import Mathlib.Algebra.Order.Archimedean.Basic import Mathlib.Order.Filter.Bases.Finite import Mathlib.Topology.Algebra.Group.Defs import Mathlib.Topology.Algebra.Monoid import Mathlib.Topology.Homeomorph.Lemmas /-! # Topological groups This file defines the following typeclasses: * `IsTopologicalGroup`, `IsTopologicalAddGroup`: multiplicative and additive topological groups, i.e., groups with continuous `()` and `(⁻¹)` / `(+)` and `(-)`; `ContinuousSub G` means that `G` has a continuous subtraction operation. There is an instance deducing `ContinuousSub` from `IsTopologicalGroup` but we use a separate typeclass because, e.g., `ℕ` and `ℝ≥0` have continuous subtraction but are not additive groups. We also define `Homeomorph` versions of several `Equiv`s: `Homeomorph.mulLeft`, `Homeomorph.mulRight`, `Homeomorph.inv`, and prove a few facts about neighbourhood filters in groups. ## Tags topological space, group, topological group -/ open Set Filter TopologicalSpace Function Topology MulOpposite Pointwise universe u v w x variable {G : Type w} {H : Type x} {α : Type u} {β : Type v} section ContinuousMulGroup /-! ### Groups with continuous multiplication In this section we prove a few statements about groups with continuous `()`. -/ variable [TopologicalSpace G] [Group G] [ContinuousMul G] /-- Multiplication from the left in a topological group as a homeomorphism. -/ @[to_additive "Addition from the left in a topological additive group as a homeomorphism."] protected def Homeomorph.mulLeft (a : G) : G ≃ₜ G := { Equiv.mulLeft a with continuous_toFun := continuous_const.mul continuous_id continuous_invFun := continuous_const.mul continuous_id } @[to_additive (attr := simp)] theorem Homeomorph.coe_mulLeft (a : G) : ⇑(Homeomorph.mulLeft a) = (a ·) := rfl @[to_additive] theorem Homeomorph.mulLeft_symm (a : G) : (Homeomorph.mulLeft a).symm = Homeomorph.mulLeft a⁻¹ := by ext rfl @[to_additive] lemma isOpenMap_mul_left (a : G) : IsOpenMap (a * ·) := (Homeomorph.mulLeft a).isOpenMap @[to_additive IsOpen.left_addCoset] theorem IsOpen.leftCoset {U : Set G} (h : IsOpen U) (x : G) : IsOpen (x • U) := isOpenMap_mul_left x _ h @[to_additive] lemma isClosedMap_mul_left (a : G) : IsClosedMap (a * ·) := (Homeomorph.mulLeft a).isClosedMap @[to_additive IsClosed.left_addCoset] theorem IsClosed.leftCoset {U : Set G} (h : IsClosed U) (x : G) : IsClosed (x • U) := isClosedMap_mul_left x _ h /-- Multiplication from the right in a topological group as a homeomorphism. -/ @[to_additive "Addition from the right in a topological additive group as a homeomorphism."] protected def Homeomorph.mulRight (a : G) : G ≃ₜ G := { Equiv.mulRight a with continuous_toFun := continuous_id.mul continuous_const continuous_invFun := continuous_id.mul continuous_const } @[to_additive (attr := simp)] lemma Homeomorph.coe_mulRight (a : G) : ⇑(Homeomorph.mulRight a) = (· * a) := rfl @[to_additive] theorem Homeomorph.mulRight_symm (a : G) : (Homeomorph.mulRight a).symm = Homeomorph.mulRight a⁻¹ := by ext rfl @[to_additive] theorem isOpenMap_mul_right (a : G) : IsOpenMap (· * a) := (Homeomorph.mulRight a).isOpenMap @[to_additive IsOpen.right_addCoset] theorem IsOpen.rightCoset {U : Set G} (h : IsOpen U) (x : G) : IsOpen (op x • U) := isOpenMap_mul_right x _ h @[to_additive] theorem isClosedMap_mul_right (a : G) : IsClosedMap (· * a) := (Homeomorph.mulRight a).isClosedMap @[to_additive IsClosed.right_addCoset] theorem IsClosed.rightCoset {U : Set G} (h : IsClosed U) (x : G) : IsClosed (op x • U) := isClosedMap_mul_right x _ h @[to_additive] theorem discreteTopology_of_isOpen_singleton_one (h : IsOpen ({1} : Set G)) : DiscreteTopology G := by rw [← singletons_open_iff_discrete] intro g suffices {g} = (g⁻¹ * ·) ⁻¹' {1} by rw [this] exact (continuous_mul_left g⁻¹).isOpen_preimage _ h simp only [mul_one, Set.preimage_mul_left_singleton, eq_self_iff_true, inv_inv, Set.singleton_eq_singleton_iff] @[to_additive] theorem discreteTopology_iff_isOpen_singleton_one : DiscreteTopology G ↔ IsOpen ({1} : Set G) := ⟨fun h => forall_open_iff_discrete.mpr h {1}, discreteTopology_of_isOpen_singleton_one⟩ end ContinuousMulGroup /-! ### `ContinuousInv` and `ContinuousNeg` -/ section ContinuousInv variable [TopologicalSpace G] [Inv G] [ContinuousInv G] @[to_additive] theorem ContinuousInv.induced {α : Type} {β : Type} {F : Type} [FunLike F α β] [Group α] [DivisionMonoid β] [MonoidHomClass F α β] [tβ : TopologicalSpace β] [ContinuousInv β] (f : F) : @ContinuousInv α (tβ.induced f) _ := by let _tα := tβ.induced f refine ⟨continuous_induced_rng.2 ?_⟩ simp only [Function.comp_def, map_inv] fun_prop @[to_additive] protected theorem Specializes.inv {x y : G} (h : x ⤳ y) : (x⁻¹) ⤳ (y⁻¹) := h.map continuous_inv @[to_additive] protected theorem Inseparable.inv {x y : G} (h : Inseparable x y) : Inseparable (x⁻¹) (y⁻¹) := h.map continuous_inv @[to_additive] protected theorem Specializes.zpow {G : Type} [DivInvMonoid G] [TopologicalSpace G] [ContinuousMul G] [ContinuousInv G] {x y : G} (h : x ⤳ y) : ∀ m : ℤ, (x ^ m) ⤳ (y ^ m) \| .ofNat n => by simpa using h.pow n \| .negSucc n => by simpa using (h.pow (n + 1)).inv @[to_additive] protected theorem Inseparable.zpow {G : Type} [DivInvMonoid G] [TopologicalSpace G] [ContinuousMul G] [ContinuousInv G] {x y : G} (h : Inseparable x y) (m : ℤ) : Inseparable (x ^ m) (y ^ m) := (h.specializes.zpow m).antisymm (h.specializes'.zpow m) @[to_additive] instance : ContinuousInv (ULift G) := ⟨continuous_uliftUp.comp (continuous_inv.comp continuous_uliftDown)⟩ @[to_additive] theorem continuousOn_inv {s : Set G} : ContinuousOn Inv.inv s := continuous_inv.continuousOn @[to_additive] theorem continuousWithinAt_inv {s : Set G} {x : G} : ContinuousWithinAt Inv.inv s x := continuous_inv.continuousWithinAt @[to_additive] theorem continuousAt_inv {x : G} : ContinuousAt Inv.inv x := continuous_inv.continuousAt @[to_additive] theorem tendsto_inv (a : G) : Tendsto Inv.inv (𝓝 a) (𝓝 a⁻¹) := continuousAt_inv variable [TopologicalSpace α] {f : α → G} {s : Set α} {x : α} @[to_additive] instance OrderDual.instContinuousInv : ContinuousInv Gᵒᵈ := ‹ContinuousInv G› @[to_additive] instance Prod.continuousInv [TopologicalSpace H] [Inv H] [ContinuousInv H] : ContinuousInv (G × H) := ⟨continuous_inv.fst'.prodMk continuous_inv.snd'⟩ variable {ι : Type} @[to_additive] instance Pi.continuousInv {C : ι → Type} [∀ i, TopologicalSpace (C i)] [∀ i, Inv (C i)] [∀ i, ContinuousInv (C i)] : ContinuousInv (∀ i, C i) where continuous_inv := continuous_pi fun i => (continuous_apply i).inv /-- A version of `Pi.continuousInv` for non-dependent functions. It is needed because sometimes Lean fails to use `Pi.continuousInv` for non-dependent functions. -/ @[to_additive "A version of `Pi.continuousNeg` for non-dependent functions. It is needed because sometimes Lean fails to use `Pi.continuousNeg` for non-dependent functions."] instance Pi.has_continuous_inv' : ContinuousInv (ι → G) := Pi.continuousInv @[to_additive] instance (priority := 100) continuousInv_of_discreteTopology [TopologicalSpace H] [Inv H] [DiscreteTopology H] : ContinuousInv H := ⟨continuous_of_discreteTopology⟩ section PointwiseLimits variable (G₁ G₂ : Type) [TopologicalSpace G₂] [T2Space G₂] @[to_additive] theorem isClosed_setOf_map_inv [Inv G₁] [Inv G₂] [ContinuousInv G₂] : IsClosed { f : G₁ → G₂ \| ∀ x, f x⁻¹ = (f x)⁻¹ } := by simp only [setOf_forall] exact isClosed_iInter fun i => isClosed_eq (continuous_apply _) (continuous_apply _).inv end PointwiseLimits instance [TopologicalSpace H] [Inv H] [ContinuousInv H] : ContinuousNeg (Additive H) where continuous_neg := @continuous_inv H _ _ _ instance [TopologicalSpace H] [Neg H] [ContinuousNeg H] : ContinuousInv (Multiplicative H) where continuous_inv := @continuous_neg H _ _ _ end ContinuousInv section ContinuousInvolutiveInv variable [TopologicalSpace G] [InvolutiveInv G] [ContinuousInv G] {s : Set G} @[to_additive] theorem IsCompact.inv (hs : IsCompact s) : IsCompact s⁻¹ := by rw [← image_inv_eq_inv] exact hs.image continuous_inv variable (G) /-- Inversion in a topological group as a homeomorphism. -/ @[to_additive "Negation in a topological group as a homeomorphism."] protected def Homeomorph.inv (G : Type) [TopologicalSpace G] [InvolutiveInv G] [ContinuousInv G] : G ≃ₜ G := { Equiv.inv G with continuous_toFun := continuous_inv continuous_invFun := continuous_inv } @[to_additive (attr := simp)] lemma Homeomorph.coe_inv {G : Type} [TopologicalSpace G] [InvolutiveInv G] [ContinuousInv G] : ⇑(Homeomorph.inv G) = Inv.inv := rfl @[to_additive] theorem nhds_inv (a : G) : 𝓝 a⁻¹ = (𝓝 a)⁻¹ := ((Homeomorph.inv G).map_nhds_eq a).symm @[to_additive] theorem isOpenMap_inv : IsOpenMap (Inv.inv : G → G) := (Homeomorph.inv _).isOpenMap @[to_additive] theorem isClosedMap_inv : IsClosedMap (Inv.inv : G → G) := (Homeomorph.inv _).isClosedMap variable {G} @[to_additive] theorem IsOpen.inv (hs : IsOpen s) : IsOpen s⁻¹ := hs.preimage continuous_inv @[to_additive] theorem IsClosed.inv (hs : IsClosed s) : IsClosed s⁻¹ := hs.preimage continuous_inv @[to_additive] theorem inv_closure : ∀ s : Set G, (closure s)⁻¹ = closure s⁻¹ := (Homeomorph.inv G).preimage_closure variable [TopologicalSpace α] {f : α → G} {s : Set α} {x : α} @[to_additive (attr := simp)] lemma continuous_inv_iff : Continuous f⁻¹ ↔ Continuous f := (Homeomorph.inv G).comp_continuous_iff @[to_additive (attr := simp)] lemma continuousAt_inv_iff : ContinuousAt f⁻¹ x ↔ ContinuousAt f x := (Homeomorph.inv G).comp_continuousAt_iff _ _ @[to_additive (attr := simp)] lemma continuousOn_inv_iff : ContinuousOn f⁻¹ s ↔ ContinuousOn f s := (Homeomorph.inv G).comp_continuousOn_iff _ _ @[to_additive] alias ⟨Continuous.of_inv, _⟩ := continuous_inv_iff @[to_additive] alias ⟨ContinuousAt.of_inv, _⟩ := continuousAt_inv_iff @[to_additive] alias ⟨ContinuousOn.of_inv, _⟩ := continuousOn_inv_iff end ContinuousInvolutiveInv section LatticeOps variable {ι' : Sort} [Inv G] @[to_additive] theorem continuousInv_sInf {ts : Set (TopologicalSpace G)} (h : ∀ t ∈ ts, @ContinuousInv G t _) : @ContinuousInv G (sInf ts) _ := letI := sInf ts { continuous_inv := continuous_sInf_rng.2 fun t ht => continuous_sInf_dom ht (@ContinuousInv.continuous_inv G t _ (h t ht)) } @[to_additive] theorem continuousInv_iInf {ts' : ι' → TopologicalSpace G} (h' : ∀ i, @ContinuousInv G (ts' i) _) : @ContinuousInv G (⨅ i, ts' i) _ := by rw [← sInf_range] exact continuousInv_sInf (Set.forall_mem_range.mpr h') @[to_additive] theorem continuousInv_inf {t₁ t₂ : TopologicalSpace G} (h₁ : @ContinuousInv G t₁ _) (h₂ : @ContinuousInv G t₂ _) : @ContinuousInv G (t₁ ⊓ t₂) _ := by rw [inf_eq_iInf] refine continuousInv_iInf fun b => ?_ cases b <;> assumption end LatticeOps @[to_additive] theorem Topology.IsInducing.continuousInv {G H : Type} [Inv G] [Inv H] [TopologicalSpace G] [TopologicalSpace H] [ContinuousInv H] {f : G → H} (hf : IsInducing f) (hf_inv : ∀ x, f x⁻¹ = (f x)⁻¹) : ContinuousInv G := ⟨hf.continuous_iff.2 <\| by simpa only [Function.comp_def, hf_inv] using hf.continuous.inv⟩ @[deprecated (since := "2024-10-28")] alias Inducing.continuousInv := IsInducing.continuousInv section IsTopologicalGroup /-! ### Topological groups A topological group is a group in which the multiplication and inversion operations are continuous. Topological additive groups are defined in the same way. Equivalently, we can require that the division operation `x y ↦ x * y⁻¹` (resp., subtraction) is continuous. -/ section Conj instance ConjAct.units_continuousConstSMul {M} [Monoid M] [TopologicalSpace M] [ContinuousMul M] : ContinuousConstSMul (ConjAct Mˣ) M := ⟨fun _ => (continuous_const.mul continuous_id).mul continuous_const⟩ variable [TopologicalSpace G] [Inv G] [Mul G] [ContinuousMul G] /-- Conjugation is jointly continuous on `G × G` when both `mul` and `inv` are continuous. -/ @[to_additive continuous_addConj_prod "Conjugation is jointly continuous on `G × G` when both `add` and `neg` are continuous."] theorem IsTopologicalGroup.continuous_conj_prod [ContinuousInv G] : Continuous fun g : G × G => g.fst * g.snd * g.fst⁻¹ := continuous_mul.mul (continuous_inv.comp continuous_fst) @[deprecated (since := "2025-03-11")] alias IsTopologicalAddGroup.continuous_conj_sum := IsTopologicalAddGroup.continuous_addConj_prod /-- Conjugation by a fixed element is continuous when `mul` is continuous. -/ @[to_additive (attr := continuity) "Conjugation by a fixed element is continuous when `add` is continuous."] theorem IsTopologicalGroup.continuous_conj (g : G) : Continuous fun h : G => g * h * g⁻¹ := (continuous_mul_right g⁻¹).comp (continuous_mul_left g) /-- Conjugation acting on fixed element of the group is continuous when both `mul` and `inv` are continuous. -/ @[to_additive (attr := continuity) "Conjugation acting on fixed element of the additive group is continuous when both `add` and `neg` are continuous."] theorem IsTopologicalGroup.continuous_conj' [ContinuousInv G] (h : G) : Continuous fun g : G => g * h * g⁻¹ := (continuous_mul_right h).mul continuous_inv end Conj variable [TopologicalSpace G] [Group G] [IsTopologicalGroup G] [TopologicalSpace α] {f : α → G} {s : Set α} {x : α} instance : IsTopologicalGroup (ULift G) where section ZPow @[to_additive (attr := continuity, fun_prop)] theorem continuous_zpow : ∀ z : ℤ, Continuous fun a : G => a ^ z \| Int.ofNat n => by simpa using continuous_pow n \| Int.negSucc n => by simpa using (continuous_pow (n + 1)).inv instance AddGroup.continuousConstSMul_int {A} [AddGroup A] [TopologicalSpace A] [IsTopologicalAddGroup A] : ContinuousConstSMul ℤ A := ⟨continuous_zsmul⟩ instance AddGroup.continuousSMul_int {A} [AddGroup A] [TopologicalSpace A] [IsTopologicalAddGroup A] : ContinuousSMul ℤ A := ⟨continuous_prod_of_discrete_left.mpr continuous_zsmul⟩ @[to_additive (attr := continuity, fun_prop)] theorem Continuous.zpow {f : α → G} (h : Continuous f) (z : ℤ) : Continuous fun b => f b ^ z := (continuous_zpow z).comp h @[to_additive] theorem continuousOn_zpow {s : Set G} (z : ℤ) : ContinuousOn (fun x => x ^ z) s := (continuous_zpow z).continuousOn @[to_additive] theorem continuousAt_zpow (x : G) (z : ℤ) : ContinuousAt (fun x => x ^ z) x := (continuous_zpow z).continuousAt @[to_additive] theorem Filter.Tendsto.zpow {α} {l : Filter α} {f : α → G} {x : G} (hf : Tendsto f l (𝓝 x)) (z : ℤ) : Tendsto (fun x => f x ^ z) l (𝓝 (x ^ z)) := (continuousAt_zpow _ _).tendsto.comp hf @[to_additive] theorem ContinuousWithinAt.zpow {f : α → G} {x : α} {s : Set α} (hf : ContinuousWithinAt f s x) (z : ℤ) : ContinuousWithinAt (fun x => f x ^ z) s x := Filter.Tendsto.zpow hf z @[to_additive (attr := fun_prop)] theorem ContinuousAt.zpow {f : α → G} {x : α} (hf : ContinuousAt f x) (z : ℤ) : ContinuousAt (fun x => f x ^ z) x := Filter.Tendsto.zpow hf z @[to_additive (attr := fun_prop)] theorem ContinuousOn.zpow {f : α → G} {s : Set α} (hf : ContinuousOn f s) (z : ℤ) : ContinuousOn (fun x => f x ^ z) s := fun x hx => (hf x hx).zpow z end ZPow section OrderedCommGroup variable [TopologicalSpace H] [CommGroup H] [PartialOrder H] [IsOrderedMonoid H] [ContinuousInv H] @[to_additive] theorem tendsto_inv_nhdsGT {a : H} : Tendsto Inv.inv (𝓝[>] a) (𝓝[<] a⁻¹) := (continuous_inv.tendsto a).inf <\| by simp [tendsto_principal_principal] @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Ioi := tendsto_neg_nhdsGT @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Ioi := tendsto_inv_nhdsGT @[to_additive] theorem tendsto_inv_nhdsLT {a : H} : Tendsto Inv.inv (𝓝[<] a) (𝓝[>] a⁻¹) := (continuous_inv.tendsto a).inf <\| by simp [tendsto_principal_principal] @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Iio := tendsto_neg_nhdsLT @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Iio := tendsto_inv_nhdsLT @[to_additive] theorem tendsto_inv_nhdsGT_inv {a : H} : Tendsto Inv.inv (𝓝[>] a⁻¹) (𝓝[<] a) := by simpa only [inv_inv] using tendsto_inv_nhdsGT (a := a⁻¹) @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Ioi_neg := tendsto_neg_nhdsGT_neg @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Ioi_inv := tendsto_inv_nhdsGT_inv @[to_additive] theorem tendsto_inv_nhdsLT_inv {a : H} : Tendsto Inv.inv (𝓝[<] a⁻¹) (𝓝[>] a) := by simpa only [inv_inv] using tendsto_inv_nhdsLT (a := a⁻¹) @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Iio_neg := tendsto_neg_nhdsLT_neg @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Iio_inv := tendsto_inv_nhdsLT_inv @[to_additive] theorem tendsto_inv_nhdsGE {a : H} : Tendsto Inv.inv (𝓝[≥] a) (𝓝[≤] a⁻¹) := (continuous_inv.tendsto a).inf <\| by simp [tendsto_principal_principal] @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Ici := tendsto_neg_nhdsGE @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Ici := tendsto_inv_nhdsGE @[to_additive] theorem tendsto_inv_nhdsLE {a : H} : Tendsto Inv.inv (𝓝[≤] a) (𝓝[≥] a⁻¹) := (continuous_inv.tendsto a).inf <\| by simp [tendsto_principal_principal] @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Iic := tendsto_neg_nhdsLE @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Iic := tendsto_inv_nhdsLE @[to_additive] theorem tendsto_inv_nhdsGE_inv {a : H} : Tendsto Inv.inv (𝓝[≥] a⁻¹) (𝓝[≤] a) := by simpa only [inv_inv] using tendsto_inv_nhdsGE (a := a⁻¹) @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Ici_neg := tendsto_neg_nhdsGE_neg @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Ici_inv := tendsto_inv_nhdsGE_inv @[to_additive] theorem tendsto_inv_nhdsLE_inv {a : H} : Tendsto Inv.inv (𝓝[≤] a⁻¹) (𝓝[≥] a) := by simpa only [inv_inv] using tendsto_inv_nhdsLE (a := a⁻¹) @[deprecated (since := "2024-12-22")] alias tendsto_neg_nhdsWithin_Iic_neg := tendsto_neg_nhdsLE_neg @[to_additive existing, deprecated (since := "2024-12-22")] alias tendsto_inv_nhdsWithin_Iic_inv := tendsto_inv_nhdsLE_inv end OrderedCommGroup @[to_additive] instance Prod.instIsTopologicalGroup [TopologicalSpace H] [Group H] [IsTopologicalGroup H] : IsTopologicalGroup (G × H) where continuous_inv := continuous_inv.prodMap continuous_inv @[to_additive] instance OrderDual.instIsTopologicalGroup : IsTopologicalGroup Gᵒᵈ where @[to_additive] instance Pi.topologicalGroup {C : β → Type} [∀ b, TopologicalSpace (C b)] [∀ b, Group (C b)] [∀ b, IsTopologicalGroup (C b)] : IsTopologicalGroup (∀ b, C b) where continuous_inv := continuous_pi fun i => (continuous_apply i).inv open MulOpposite @[to_additive] instance [Inv α] [ContinuousInv α] : ContinuousInv αᵐᵒᵖ := opHomeomorph.symm.isInducing.continuousInv unop_inv /-- If multiplication is continuous in `α`, then it also is in `αᵐᵒᵖ`. -/ @[to_additive "If addition is continuous in `α`, then it also is in `αᵃᵒᵖ`."] instance [Group α] [IsTopologicalGroup α] : IsTopologicalGroup αᵐᵒᵖ where variable (G) @[to_additive] theorem nhds_one_symm : comap Inv.inv (𝓝 (1 : G)) = 𝓝 (1 : G) := ((Homeomorph.inv G).comap_nhds_eq _).trans (congr_arg nhds inv_one) @[to_additive] theorem nhds_one_symm' : map Inv.inv (𝓝 (1 : G)) = 𝓝 (1 : G) := ((Homeomorph.inv G).map_nhds_eq _).trans (congr_arg nhds inv_one) @[to_additive] theorem inv_mem_nhds_one {S : Set G} (hS : S ∈ (𝓝 1 : Filter G)) : S⁻¹ ∈ 𝓝 (1 : G) := by rwa [← nhds_one_symm'] at hS /-- The map `(x, y) ↦ (x, x y)` as a homeomorphism. This is a shear mapping. -/ @[to_additive "The map `(x, y) ↦ (x, x + y)` as a homeomorphism. This is a shear mapping."] protected def Homeomorph.shearMulRight : G × G ≃ₜ G × G := { Equiv.prodShear (Equiv.refl _) Equiv.mulLeft with continuous_toFun := by dsimp; fun_prop continuous_invFun := by dsimp; fun_prop } @[to_additive (attr := simp)] theorem Homeomorph.shearMulRight_coe : ⇑(Homeomorph.shearMulRight G) = fun z : G × G => (z.1, z.1 * z.2) := rfl @[to_additive (attr := simp)] theorem Homeomorph.shearMulRight_symm_coe : ⇑(Homeomorph.shearMulRight G).symm = fun z : G × G => (z.1, z.1⁻¹ * z.2) := rfl variable {G} @[to_additive] protected theorem Topology.IsInducing.topologicalGroup {F : Type} [Group H] [TopologicalSpace H] [FunLike F H G] [MonoidHomClass F H G] (f : F) (hf : IsInducing f) : IsTopologicalGroup H := { toContinuousMul := hf.continuousMul _ toContinuousInv := hf.continuousInv (map_inv f) } @[deprecated (since := "2024-10-28")] alias Inducing.topologicalGroup := IsInducing.topologicalGroup @[to_additive] theorem topologicalGroup_induced {F : Type} [Group H] [FunLike F H G] [MonoidHomClass F H G] (f : F) : @IsTopologicalGroup H (induced f ‹_›) _ := letI := induced f ‹_› IsInducing.topologicalGroup f ⟨rfl⟩ namespace Subgroup @[to_additive] instance (S : Subgroup G) : IsTopologicalGroup S := IsInducing.subtypeVal.topologicalGroup S.subtype end Subgroup /-- The (topological-space) closure of a subgroup of a topological group is itself a subgroup. -/ @[to_additive "The (topological-space) closure of an additive subgroup of an additive topological group is itself an additive subgroup."] def Subgroup.topologicalClosure (s : Subgroup G) : Subgroup G := { s.toSubmonoid.topologicalClosure with carrier := _root_.closure (s : Set G) inv_mem' := fun {g} hg => by simpa only [← Set.mem_inv, inv_closure, inv_coe_set] using hg } @[to_additive (attr := simp)] theorem Subgroup.topologicalClosure_coe {s : Subgroup G} : (s.topologicalClosure : Set G) = _root_.closure s := rfl @[to_additive] theorem Subgroup.le_topologicalClosure (s : Subgroup G) : s ≤ s.topologicalClosure := _root_.subset_closure @[to_additive] theorem Subgroup.isClosed_topologicalClosure (s : Subgroup G) : IsClosed (s.topologicalClosure : Set G) := isClosed_closure @[to_additive] theorem Subgroup.topologicalClosure_minimal (s : Subgroup G) {t : Subgroup G} (h : s ≤ t) (ht : IsClosed (t : Set G)) : s.topologicalClosure ≤ t := closure_minimal h ht @[to_additive] theorem DenseRange.topologicalClosure_map_subgroup [Group H] [TopologicalSpace H] [IsTopologicalGroup H] {f : G →* H} (hf : Continuous f) (hf' : DenseRange f) {s : Subgroup G} (hs : s.topologicalClosure = ⊤) : (s.map f).topologicalClosure = ⊤ := by rw [SetLike.ext'_iff] at hs ⊢ simp only [Subgroup.topologicalClosure_coe, Subgroup.coe_top, ← dense_iff_closure_eq] at hs ⊢ exact hf'.dense_image hf hs /-- The topological closure of a normal subgroup is normal. -/ @[to_additive "The topological closure of a normal additive subgroup is normal."] theorem Subgroup.is_normal_topologicalClosure {G : Type} [TopologicalSpace G] [Group G] [IsTopologicalGroup G] (N : Subgroup G) [N.Normal] : (Subgroup.topologicalClosure N).Normal where conj_mem n hn g := by apply map_mem_closure (IsTopologicalGroup.continuous_conj g) hn exact fun m hm => Subgroup.Normal.conj_mem inferInstance m hm g @[to_additive] theorem mul_mem_connectedComponent_one {G : Type} [TopologicalSpace G] [MulOneClass G] [ContinuousMul G] {g h : G} (hg : g ∈ connectedComponent (1 : G)) (hh : h ∈ connectedComponent (1 : G)) : g * h ∈ connectedComponent (1 : G) := by rw [connectedComponent_eq hg] have hmul : g ∈ connectedComponent (g * h) := by apply Continuous.image_connectedComponent_subset (continuous_mul_left g) rw [← connectedComponent_eq hh] exact ⟨(1 : G), mem_connectedComponent, by simp only [mul_one]⟩ simpa [← connectedComponent_eq hmul] using mem_connectedComponent @[to_additive] theorem inv_mem_connectedComponent_one {G : Type} [TopologicalSpace G] [DivisionMonoid G] [ContinuousInv G] {g : G} (hg : g ∈ connectedComponent (1 : G)) : g⁻¹ ∈ connectedComponent (1 : G) := by rw [← inv_one] exact Continuous.image_connectedComponent_subset continuous_inv _ ((Set.mem_image _ _ _).mp ⟨g, hg, rfl⟩) /-- The connected component of 1 is a subgroup of `G`. -/ @[to_additive "The connected component of 0 is a subgroup of `G`."] def Subgroup.connectedComponentOfOne (G : Type) [TopologicalSpace G] [Group G] [IsTopologicalGroup G] : Subgroup G where carrier := connectedComponent (1 : G) one_mem' := mem_connectedComponent mul_mem' hg hh := mul_mem_connectedComponent_one hg hh inv_mem' hg := inv_mem_connectedComponent_one hg /-- If a subgroup of a topological group is commutative, then so is its topological closure. See note [reducible non-instances]. -/ @[to_additive "If a subgroup of an additive topological group is commutative, then so is its topological closure. See note [reducible non-instances]."] abbrev Subgroup.commGroupTopologicalClosure [T2Space G] (s : Subgroup G) (hs : ∀ x y : s, x * y = y * x) : CommGroup s.topologicalClosure := { s.topologicalClosure.toGroup, s.toSubmonoid.commMonoidTopologicalClosure hs with } variable (G) in @[to_additive] lemma Subgroup.coe_topologicalClosure_bot : ((⊥ : Subgroup G).topologicalClosure : Set G) = _root_.closure ({1} : Set G) := by simp @[to_additive exists_nhds_half_neg] theorem exists_nhds_split_inv {s : Set G} (hs : s ∈ 𝓝 (1 : G)) : ∃ V ∈ 𝓝 (1 : G), ∀ v ∈ V, ∀ w ∈ V, v / w ∈ s := by have : (fun p : G × G => p.1 * p.2⁻¹) ⁻¹' s ∈ 𝓝 ((1, 1) : G × G) := continuousAt_fst.mul continuousAt_snd.inv (by simpa) simpa only [div_eq_mul_inv, nhds_prod_eq, mem_prod_self_iff, prod_subset_iff, mem_preimage] using this @[to_additive] theorem nhds_translation_mul_inv (x : G) : comap (· * x⁻¹) (𝓝 1) = 𝓝 x := ((Homeomorph.mulRight x⁻¹).comap_nhds_eq 1).trans <\| show 𝓝 (1 * x⁻¹⁻¹) = 𝓝 x by simp @[to_additive (attr := simp)] theorem map_mul_left_nhds (x y : G) : map (x * ·) (𝓝 y) = 𝓝 (x * y) := (Homeomorph.mulLeft x).map_nhds_eq y @[to_additive] theorem map_mul_left_nhds_one (x : G) : map (x * ·) (𝓝 1) = 𝓝 x := by simp @[to_additive (attr := simp)] theorem map_mul_right_nhds (x y : G) : map (· * x) (𝓝 y) = 𝓝 (y * x) := (Homeomorph.mulRight x).map_nhds_eq y @[to_additive] theorem map_mul_right_nhds_one (x : G) : map (· * x) (𝓝 1) = 𝓝 x := by simp @[to_additive] theorem Filter.HasBasis.nhds_of_one {ι : Sort} {p : ι → Prop} {s : ι → Set G} (hb : HasBasis (𝓝 1 : Filter G) p s) (x : G) : HasBasis (𝓝 x) p fun i => { y \| y / x ∈ s i } := by rw [← nhds_translation_mul_inv] simp_rw [div_eq_mul_inv] exact hb.comap _ @[to_additive] theorem mem_closure_iff_nhds_one {x : G} {s : Set G} : x ∈ closure s ↔ ∀ U ∈ (𝓝 1 : Filter G), ∃ y ∈ s, y / x ∈ U := by rw [mem_closure_iff_nhds_basis ((𝓝 1 : Filter G).basis_sets.nhds_of_one x)] simp_rw [Set.mem_setOf, id] /-- A monoid homomorphism (a bundled morphism of a type that implements `MonoidHomClass`) from a topological group to a topological monoid is continuous provided that it is continuous at one. See also `uniformContinuous_of_continuousAt_one`. -/ @[to_additive "An additive monoid homomorphism (a bundled morphism of a type that implements `AddMonoidHomClass`) from an additive topological group to an additive topological monoid is continuous provided that it is continuous at zero. See also `uniformContinuous_of_continuousAt_zero`."] theorem continuous_of_continuousAt_one {M hom : Type} [MulOneClass M] [TopologicalSpace M] [ContinuousMul M] [FunLike hom G M] [MonoidHomClass hom G M] (f : hom) (hf : ContinuousAt f 1) : Continuous f := continuous_iff_continuousAt.2 fun x => by simpa only [ContinuousAt, ← map_mul_left_nhds_one x, tendsto_map'_iff, Function.comp_def, map_mul, map_one, mul_one] using hf.tendsto.const_mul (f x) @[to_additive continuous_of_continuousAt_zero₂] theorem continuous_of_continuousAt_one₂ {H M : Type} [CommMonoid M] [TopologicalSpace M] [ContinuousMul M] [Group H] [TopologicalSpace H] [IsTopologicalGroup H] (f : G → H →* M) (hf : ContinuousAt (fun x : G × H ↦ f x.1 x.2) (1, 1)) (hl : ∀ x, ContinuousAt (f x) 1) (hr : ∀ y, ContinuousAt (f · y) 1) : Continuous (fun x : G × H ↦ f x.1 x.2) := continuous_iff_continuousAt.2 fun (x, y) => by simp only [ContinuousAt, nhds_prod_eq, ← map_mul_left_nhds_one x, ← map_mul_left_nhds_one y, prod_map_map_eq, tendsto_map'_iff, Function.comp_def, map_mul, MonoidHom.mul_apply] at * refine ((tendsto_const_nhds.mul ((hr y).comp tendsto_fst)).mul (((hl x).comp tendsto_snd).mul hf)).mono_right (le_of_eq ?_) simp only [map_one, mul_one, MonoidHom.one_apply] @[to_additive] lemma IsTopologicalGroup.isInducing_iff_nhds_one {H : Type} [Group H] [TopologicalSpace H] [IsTopologicalGroup H] {F : Type} [FunLike F G H] [MonoidHomClass F G H] {f : F} : Topology.IsInducing f ↔ 𝓝 (1 : G) = (𝓝 (1 : H)).comap f := by rw [Topology.isInducing_iff_nhds] refine ⟨(map_one f ▸ · 1), fun hf x ↦ ?_⟩ rw [← nhds_translation_mul_inv, ← nhds_translation_mul_inv (f x), Filter.comap_comap, hf, Filter.comap_comap] congr 1 ext; simp @[to_additive] lemma TopologicalGroup.isOpenMap_iff_nhds_one {H : Type} [Monoid H] [TopologicalSpace H] [ContinuousConstSMul H H] {F : Type} [FunLike F G H] [MonoidHomClass F G H] {f : F} : IsOpenMap f ↔ 𝓝 1 ≤ .map f (𝓝 1) := by refine ⟨fun H ↦ map_one f ▸ H.nhds_le 1, fun h ↦ IsOpenMap.of_nhds_le fun x ↦ ?_⟩ have : Filter.map (f x * ·) (𝓝 1) = 𝓝 (f x) := by simpa [-Homeomorph.map_nhds_eq, Units.smul_def] using (Homeomorph.smul ((toUnits x).map (MonoidHomClass.toMonoidHom f))).map_nhds_eq (1 : H) rw [← map_mul_left_nhds_one x, Filter.map_map, Function.comp_def, ← this] refine (Filter.map_mono h).trans ?_ simp [Function.comp_def] -- TODO: unify with `QuotientGroup.isOpenQuotientMap_mk` /-- Let `A` and `B` be topological groups, and let `φ : A → B` be a continuous surjective group homomorphism. Assume furthermore that `φ` is a quotient map (i.e., `V ⊆ B` is open iff `φ⁻¹ V` is open). Then `φ` is an open quotient map, and in particular an open map. -/ @[to_additive "Let `A` and `B` be topological additive groups, and let `φ : A → B` be a continuous surjective additive group homomorphism. Assume furthermore that `φ` is a quotient map (i.e., `V ⊆ B` is open iff `φ⁻¹ V` is open). Then `φ` is an open quotient map, and in particular an open map."] lemma MonoidHom.isOpenQuotientMap_of_isQuotientMap {A : Type} [Group A] [TopologicalSpace A] [ContinuousMul A] {B : Type} [Group B] [TopologicalSpace B] {F : Type} [FunLike F A B] [MonoidHomClass F A B] {φ : F} (hφ : IsQuotientMap φ) : IsOpenQuotientMap φ where surjective := hφ.surjective continuous := hφ.continuous isOpenMap := by -- We need to check that if `U ⊆ A` is open then `φ⁻¹ (φ U)` is open. intro U hU rw [← hφ.isOpen_preimage] -- It suffices to show that `φ⁻¹ (φ U) = ⋃ (U k⁻¹)` as `k` runs through the kernel of `φ`, -- as `U * k⁻¹` is open because `x ↦ x * k` is continuous. -- Remark: here is where we use that we have groups not monoids (you cannot avoid -- using both `k` and `k⁻¹` at this point). suffices ⇑φ ⁻¹' (⇑φ '' U) = ⋃ k ∈ ker (φ : A →* B), (fun x ↦ x * k) ⁻¹' U by exact this ▸ isOpen_biUnion (fun k _ ↦ Continuous.isOpen_preimage (by fun_prop) _ hU) ext x -- But this is an elementary calculation. constructor · rintro ⟨y, hyU, hyx⟩ apply Set.mem_iUnion_of_mem (x⁻¹ * y) simp_all · rintro ⟨_, ⟨k, rfl⟩, _, ⟨(hk : φ k = 1), rfl⟩, hx⟩ use x * k, hx rw [map_mul, hk, mul_one] @[to_additive] theorem IsTopologicalGroup.ext {G : Type} [Group G] {t t' : TopologicalSpace G} (tg : @IsTopologicalGroup G t _) (tg' : @IsTopologicalGroup G t' _) (h : @nhds G t 1 = @nhds G t' 1) : t = t' := TopologicalSpace.ext_nhds fun x ↦ by rw [← @nhds_translation_mul_inv G t _ _ x, ← @nhds_translation_mul_inv G t' _ _ x, ← h] @[to_additive] theorem IsTopologicalGroup.ext_iff {G : Type} [Group G] {t t' : TopologicalSpace G} (tg : @IsTopologicalGroup G t _) (tg' : @IsTopologicalGroup G t' _) : t = t' ↔ @nhds G t 1 = @nhds G t' 1 := ⟨fun h => h ▸ rfl, tg.ext tg'⟩ @[to_additive] theorem ContinuousInv.of_nhds_one {G : Type} [Group G] [TopologicalSpace G] (hinv : Tendsto (fun x : G => x⁻¹) (𝓝 1) (𝓝 1)) (hleft : ∀ x₀ : G, 𝓝 x₀ = map (fun x : G => x₀ x) (𝓝 1)) (hconj : ∀ x₀ : G, Tendsto (fun x : G => x₀ * x * x₀⁻¹) (𝓝 1) (𝓝 1)) : ContinuousInv G := by refine ⟨continuous_iff_continuousAt.2 fun x₀ => ?_⟩ have : Tendsto (fun x => x₀⁻¹ * (x₀ * x⁻¹ * x₀⁻¹)) (𝓝 1) (map (x₀⁻¹ * ·) (𝓝 1)) := (tendsto_map.comp <\| hconj x₀).comp hinv simpa only [ContinuousAt, hleft x₀, hleft x₀⁻¹, tendsto_map'_iff, Function.comp_def, mul_assoc, mul_inv_rev, inv_mul_cancel_left] using this @[to_additive] theorem IsTopologicalGroup.of_nhds_one' {G : Type u} [Group G] [TopologicalSpace G] (hmul : Tendsto (uncurry ((· * ·) : G → G → G)) (𝓝 1 ×ˢ 𝓝 1) (𝓝 1)) (hinv : Tendsto (fun x : G => x⁻¹) (𝓝 1) (𝓝 1)) (hleft : ∀ x₀ : G, 𝓝 x₀ = map (fun x => x₀ * x) (𝓝 1)) (hright : ∀ x₀ : G, 𝓝 x₀ = map (fun x => x * x₀) (𝓝 1)) : IsTopologicalGroup G := { toContinuousMul := ContinuousMul.of_nhds_one hmul hleft hright toContinuousInv := ContinuousInv.of_nhds_one hinv hleft fun x₀ => le_of_eq (by rw [show (fun x => x₀ * x * x₀⁻¹) = (fun x => x * x₀⁻¹) ∘ fun x => x₀ * x from rfl, ← map_map, ← hleft, hright, map_map] simp [(· ∘ ·)]) } @[to_additive] theorem IsTopologicalGroup.of_nhds_one {G : Type u} [Group G] [TopologicalSpace G] (hmul : Tendsto (uncurry ((· * ·) : G → G → G)) (𝓝 1 ×ˢ 𝓝 1) (𝓝 1)) (hinv : Tendsto (fun x : G => x⁻¹) (𝓝 1) (𝓝 1)) (hleft : ∀ x₀ : G, 𝓝 x₀ = map (x₀ * ·) (𝓝 1)) (hconj : ∀ x₀ : G, Tendsto (x₀ * · * x₀⁻¹) (𝓝 1) (𝓝 1)) : IsTopologicalGroup G := by refine IsTopologicalGroup.of_nhds_one' hmul hinv hleft fun x₀ => ?_ replace hconj : ∀ x₀ : G, map (x₀ * · * x₀⁻¹) (𝓝 1) = 𝓝 1 := fun x₀ => map_eq_of_inverse (x₀⁻¹ * · * x₀⁻¹⁻¹) (by ext; simp [mul_assoc]) (hconj _) (hconj _) rw [← hconj x₀] simpa [Function.comp_def] using hleft _ @[to_additive] theorem IsTopologicalGroup.of_comm_of_nhds_one {G : Type u} [CommGroup G] [TopologicalSpace G] (hmul : Tendsto (uncurry ((· * ·) : G → G → G)) (𝓝 1 ×ˢ 𝓝 1) (𝓝 1)) (hinv : Tendsto (fun x : G => x⁻¹) (𝓝 1) (𝓝 1)) (hleft : ∀ x₀ : G, 𝓝 x₀ = map (x₀ * ·) (𝓝 1)) : IsTopologicalGroup G := IsTopologicalGroup.of_nhds_one hmul hinv hleft (by simpa using tendsto_id) variable (G) in /-- Any first countable topological group has an antitone neighborhood basis `u : ℕ → Set G` for which `(u (n + 1)) ^ 2 ⊆ u n`. The existence of such a neighborhood basis is a key tool for `QuotientGroup.completeSpace` -/ @[to_additive "Any first countable topological additive group has an antitone neighborhood basis `u : ℕ → set G` for which `u (n + 1) + u (n + 1) ⊆ u n`. The existence of such a neighborhood basis is a key tool for `QuotientAddGroup.completeSpace`"] theorem IsTopologicalGroup.exists_antitone_basis_nhds_one [FirstCountableTopology G] : ∃ u : ℕ → Set G, (𝓝 1).HasAntitoneBasis u ∧ ∀ n, u (n + 1) * u (n + 1) ⊆ u n := by rcases (𝓝 (1 : G)).exists_antitone_basis with ⟨u, hu, u_anti⟩ have := ((hu.prod_nhds hu).tendsto_iff hu).mp (by simpa only [mul_one] using continuous_mul.tendsto ((1, 1) : G × G)) simp only [and_self_iff, mem_prod, and_imp, Prod.forall, exists_true_left, Prod.exists, forall_true_left] at this have event_mul : ∀ n : ℕ, ∀ᶠ m in atTop, u m * u m ⊆ u n := by intro n rcases this n with ⟨j, k, -, h⟩ refine atTop_basis.eventually_iff.mpr ⟨max j k, True.intro, fun m hm => ?_⟩ rintro - ⟨a, ha, b, hb, rfl⟩ exact h a b (u_anti ((le_max_left _ _).trans hm) ha) (u_anti ((le_max_right _ _).trans hm) hb) obtain ⟨φ, -, hφ, φ_anti_basis⟩ := HasAntitoneBasis.subbasis_with_rel ⟨hu, u_anti⟩ event_mul exact ⟨u ∘ φ, φ_anti_basis, fun n => hφ n.lt_succ_self⟩ end IsTopologicalGroup section ContinuousDiv variable [TopologicalSpace G] [Div G] [ContinuousDiv G] @[to_additive const_sub] theorem Filter.Tendsto.const_div' (b : G) {c : G} {f : α → G} {l : Filter α} (h : Tendsto f l (𝓝 c)) : Tendsto (fun k : α => b / f k) l (𝓝 (b / c)) := tendsto_const_nhds.div' h @[to_additive] lemma Filter.tendsto_const_div_iff {G : Type} [CommGroup G] [TopologicalSpace G] [ContinuousDiv G] (b : G) {c : G} {f : α → G} {l : Filter α} : Tendsto (fun k : α ↦ b / f k) l (𝓝 (b / c)) ↔ Tendsto f l (𝓝 c) := by refine ⟨fun h ↦ ?_, Filter.Tendsto.const_div' b⟩ convert h.const_div' b with k <;> rw [div_div_cancel] @[to_additive sub_const] theorem Filter.Tendsto.div_const' {c : G} {f : α → G} {l : Filter α} (h : Tendsto f l (𝓝 c)) (b : G) : Tendsto (f · / b) l (𝓝 (c / b)) := h.div' tendsto_const_nhds lemma Filter.tendsto_div_const_iff {G : Type} [CommGroupWithZero G] [TopologicalSpace G] [ContinuousDiv G] {b : G} (hb : b ≠ 0) {c : G} {f : α → G} {l : Filter α} : Tendsto (f · / b) l (𝓝 (c / b)) ↔ Tendsto f l (𝓝 c) := by refine ⟨fun h ↦ ?_, fun h ↦ Filter.Tendsto.div_const' h b⟩ convert h.div_const' b⁻¹ with k <;> rw [div_div, mul_inv_cancel₀ hb, div_one] lemma Filter.tendsto_sub_const_iff {G : Type*} [AddCommGroup G] [TopologicalSpace G] [ContinuousSub G]	(b : G) {c : G} {f : α → G} {l : Filter α} : Tendsto (f · - b) l (𝓝 (c - b)) ↔ Tendsto f l (𝓝 c) := by refine ⟨fun h ↦ ?_, fun h ↦ Filter.Tendsto.sub_const h b⟩ convert h.sub_const (-b) with k <;> rw [sub_sub, ← sub_eq_add_neg, sub_self, sub_zero] variable [TopologicalSpace α] {f g : α → G} {s : Set α} {x : α} @[to_additive (attr := continuity) continuous_sub_left] lemma continuous_div_left' (a : G) : Continuous (a / ·) := continuous_const.div' continuous_id	Mathlib/Topology/Algebra/Group/Basic.lean	928	937
/- Copyright (c) 2018 Chris Hughes. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Chris Hughes, Abhimanyu Pallavi Sudhir, Jean Lo, Calle Sönne -/ import Mathlib.Analysis.SpecialFunctions.Exp import Mathlib.Data.Nat.Factorization.Defs import Mathlib.Analysis.NormedSpace.Real import Mathlib.Data.Rat.Cast.CharZero /-! # Real logarithm In this file we define `Real.log` to be the logarithm of a real number. As usual, we extend it from its domain `(0, +∞)` to a globally defined function. We choose to do it so that `log 0 = 0` and `log (-x) = log x`. We prove some basic properties of this function and show that it is continuous. ## Tags logarithm, continuity -/ open Set Filter Function open Topology noncomputable section namespace Real variable {x y : ℝ} /-- The real logarithm function, equal to the inverse of the exponential for `x > 0`, to `log \|x\|` for `x < 0`, and to `0` for `0`. We use this unconventional extension to `(-∞, 0]` as it gives the formula `log (x * y) = log x + log y` for all nonzero `x` and `y`, and the derivative of `log` is `1/x` away from `0`. -/ @[pp_nodot] noncomputable def log (x : ℝ) : ℝ := if hx : x = 0 then 0 else expOrderIso.symm ⟨\|x\|, abs_pos.2 hx⟩ theorem log_of_ne_zero (hx : x ≠ 0) : log x = expOrderIso.symm ⟨\|x\|, abs_pos.2 hx⟩ := dif_neg hx theorem log_of_pos (hx : 0 < x) : log x = expOrderIso.symm ⟨x, hx⟩ := by rw [log_of_ne_zero hx.ne'] congr exact abs_of_pos hx theorem exp_log_eq_abs (hx : x ≠ 0) : exp (log x) = \|x\| := by rw [log_of_ne_zero hx, ← coe_expOrderIso_apply, OrderIso.apply_symm_apply, Subtype.coe_mk] theorem exp_log (hx : 0 < x) : exp (log x) = x := by rw [exp_log_eq_abs hx.ne'] exact abs_of_pos hx theorem exp_log_of_neg (hx : x < 0) : exp (log x) = -x := by rw [exp_log_eq_abs (ne_of_lt hx)] exact abs_of_neg hx theorem le_exp_log (x : ℝ) : x ≤ exp (log x) := by by_cases h_zero : x = 0 · rw [h_zero, log, dif_pos rfl, exp_zero] exact zero_le_one · rw [exp_log_eq_abs h_zero] exact le_abs_self _ @[simp] theorem log_exp (x : ℝ) : log (exp x) = x := exp_injective <\| exp_log (exp_pos x) theorem exp_one_mul_le_exp {x : ℝ} : exp 1 * x ≤ exp x := by by_cases hx0 : x ≤ 0 · apply le_trans (mul_nonpos_of_nonneg_of_nonpos (exp_pos 1).le hx0) (exp_nonneg x) · have h := add_one_le_exp (log x) rwa [← exp_le_exp, exp_add, exp_log (lt_of_not_le hx0), mul_comm] at h theorem two_mul_le_exp {x : ℝ} : 2 * x ≤ exp x := by by_cases hx0 : x < 0 · exact le_trans (mul_nonpos_of_nonneg_of_nonpos (by simp only [Nat.ofNat_nonneg]) hx0.le) (exp_nonneg x) · apply le_trans (mul_le_mul_of_nonneg_right _ (le_of_not_lt hx0)) exp_one_mul_le_exp have := Real.add_one_le_exp 1 rwa [one_add_one_eq_two] at this theorem surjOn_log : SurjOn log (Ioi 0) univ := fun x _ => ⟨exp x, exp_pos x, log_exp x⟩ theorem log_surjective : Surjective log := fun x => ⟨exp x, log_exp x⟩ @[simp] theorem range_log : range log = univ := log_surjective.range_eq @[simp] theorem log_zero : log 0 = 0 := dif_pos rfl @[simp] theorem log_one : log 1 = 0 := exp_injective <\| by rw [exp_log zero_lt_one, exp_zero] /-- This holds true for all `x : ℝ` because of the junk values `0 / 0 = 0` and `log 0 = 0`. -/ @[simp] lemma log_div_self (x : ℝ) : log (x / x) = 0 := by obtain rfl \| hx := eq_or_ne x 0 <;> simp [] @[simp] theorem log_abs (x : ℝ) : log \|x\| = log x := by by_cases h : x = 0 · simp [h] · rw [← exp_eq_exp, exp_log_eq_abs h, exp_log_eq_abs (abs_pos.2 h).ne', abs_abs] @[simp] theorem log_neg_eq_log (x : ℝ) : log (-x) = log x := by rw [← log_abs x, ← log_abs (-x), abs_neg] theorem sinh_log {x : ℝ} (hx : 0 < x) : sinh (log x) = (x - x⁻¹) / 2 := by rw [sinh_eq, exp_neg, exp_log hx] theorem cosh_log {x : ℝ} (hx : 0 < x) : cosh (log x) = (x + x⁻¹) / 2 := by rw [cosh_eq, exp_neg, exp_log hx] theorem surjOn_log' : SurjOn log (Iio 0) univ := fun x _ => ⟨-exp x, neg_lt_zero.2 <\| exp_pos x, by rw [log_neg_eq_log, log_exp]⟩ theorem log_mul (hx : x ≠ 0) (hy : y ≠ 0) : log (x y) = log x + log y := exp_injective <\| by rw [exp_log_eq_abs (mul_ne_zero hx hy), exp_add, exp_log_eq_abs hx, exp_log_eq_abs hy, abs_mul] theorem log_div (hx : x ≠ 0) (hy : y ≠ 0) : log (x / y) = log x - log y := exp_injective <\| by rw [exp_log_eq_abs (div_ne_zero hx hy), exp_sub, exp_log_eq_abs hx, exp_log_eq_abs hy, abs_div] @[simp] theorem log_inv (x : ℝ) : log x⁻¹ = -log x := by by_cases hx : x = 0; · simp [hx] rw [← exp_eq_exp, exp_log_eq_abs (inv_ne_zero hx), exp_neg, exp_log_eq_abs hx, abs_inv] theorem log_le_log_iff (h : 0 < x) (h₁ : 0 < y) : log x ≤ log y ↔ x ≤ y := by rw [← exp_le_exp, exp_log h, exp_log h₁] @[gcongr, bound] lemma log_le_log (hx : 0 < x) (hxy : x ≤ y) : log x ≤ log y := (log_le_log_iff hx (hx.trans_le hxy)).2 hxy @[gcongr, bound] theorem log_lt_log (hx : 0 < x) (h : x < y) : log x < log y := by rwa [← exp_lt_exp, exp_log hx, exp_log (lt_trans hx h)] theorem log_lt_log_iff (hx : 0 < x) (hy : 0 < y) : log x < log y ↔ x < y := by rw [← exp_lt_exp, exp_log hx, exp_log hy] theorem log_le_iff_le_exp (hx : 0 < x) : log x ≤ y ↔ x ≤ exp y := by rw [← exp_le_exp, exp_log hx] theorem log_lt_iff_lt_exp (hx : 0 < x) : log x < y ↔ x < exp y := by rw [← exp_lt_exp, exp_log hx] theorem le_log_iff_exp_le (hy : 0 < y) : x ≤ log y ↔ exp x ≤ y := by rw [← exp_le_exp, exp_log hy] theorem lt_log_iff_exp_lt (hy : 0 < y) : x < log y ↔ exp x < y := by rw [← exp_lt_exp, exp_log hy] theorem log_pos_iff (hx : 0 ≤ x) : 0 < log x ↔ 1 < x := by rcases hx.eq_or_lt with (rfl \| hx) · simp [le_refl, zero_le_one] rw [← log_one] exact log_lt_log_iff zero_lt_one hx @[bound] theorem log_pos (hx : 1 < x) : 0 < log x := (log_pos_iff (lt_trans zero_lt_one hx).le).2 hx theorem log_pos_of_lt_neg_one (hx : x < -1) : 0 < log x := by rw [← neg_neg x, log_neg_eq_log] have : 1 < -x := by linarith exact log_pos this theorem log_neg_iff (h : 0 < x) : log x < 0 ↔ x < 1 := by rw [← log_one] exact log_lt_log_iff h zero_lt_one @[bound] theorem log_neg (h0 : 0 < x) (h1 : x < 1) : log x < 0 := (log_neg_iff h0).2 h1 theorem log_neg_of_lt_zero (h0 : x < 0) (h1 : -1 < x) : log x < 0 := by rw [← neg_neg x, log_neg_eq_log] have h0' : 0 < -x := by linarith have h1' : -x < 1 := by linarith exact log_neg h0' h1' theorem log_nonneg_iff (hx : 0 < x) : 0 ≤ log x ↔ 1 ≤ x := by rw [← not_lt, log_neg_iff hx, not_lt] @[bound] theorem log_nonneg (hx : 1 ≤ x) : 0 ≤ log x := (log_nonneg_iff (zero_lt_one.trans_le hx)).2 hx theorem log_nonpos_iff (hx : 0 ≤ x) : log x ≤ 0 ↔ x ≤ 1 := by rcases hx.eq_or_lt with (rfl \| hx) · simp [le_refl, zero_le_one] rw [← not_lt, log_pos_iff hx.le, not_lt] @[deprecated (since := "2025-01-16")] alias log_nonpos_iff' := log_nonpos_iff @[bound] theorem log_nonpos (hx : 0 ≤ x) (h'x : x ≤ 1) : log x ≤ 0 := (log_nonpos_iff hx).2 h'x theorem log_natCast_nonneg (n : ℕ) : 0 ≤ log n := by if hn : n = 0 then simp [hn]	else have : (1 : ℝ) ≤ n := mod_cast Nat.one_le_of_lt <\| Nat.pos_of_ne_zero hn exact log_nonneg this	Mathlib/Analysis/SpecialFunctions/Log/Basic.lean	210	213
/- Copyright (c) 2017 Microsoft Corporation. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Mario Carneiro -/ import Mathlib.Data.WSeq.Basic import Mathlib.Data.WSeq.Defs import Mathlib.Data.WSeq.Productive import Mathlib.Data.WSeq.Relation deprecated_module (since := "2025-04-13")		Mathlib/Data/Seq/WSeq.lean	1,500	1,515
/- Copyright (c) 2018 Ellen Arlt. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Ellen Arlt, Blair Shi, Sean Leather, Mario Carneiro, Johan Commelin, Lu-Ming Zhang -/ import Mathlib.Algebra.Algebra.Opposite import Mathlib.Algebra.Algebra.Pi import Mathlib.Algebra.BigOperators.RingEquiv import Mathlib.Data.Finite.Prod import Mathlib.Data.Matrix.Mul import Mathlib.LinearAlgebra.Pi /-! # Matrices This file contains basic results on matrices including bundled versions of matrix operators. ## Implementation notes For convenience, `Matrix m n α` is defined as `m → n → α`, as this allows elements of the matrix to be accessed with `A i j`. However, it is not advisable to _construct_ matrices using terms of the form `fun i j ↦ _` or even `(fun i j ↦ _ : Matrix m n α)`, as these are not recognized by Lean as having the right type. Instead, `Matrix.of` should be used. ## TODO Under various conditions, multiplication of infinite matrices makes sense. These have not yet been implemented. -/ assert_not_exists Star universe u u' v w variable {l m n o : Type} {m' : o → Type} {n' : o → Type} variable {R : Type} {S : Type} {α : Type v} {β : Type w} {γ : Type} namespace Matrix instance decidableEq [DecidableEq α] [Fintype m] [Fintype n] : DecidableEq (Matrix m n α) := Fintype.decidablePiFintype instance {n m} [Fintype m] [DecidableEq m] [Fintype n] [DecidableEq n] (α) [Fintype α] : Fintype (Matrix m n α) := inferInstanceAs (Fintype (m → n → α)) instance {n m} [Finite m] [Finite n] (α) [Finite α] : Finite (Matrix m n α) := inferInstanceAs (Finite (m → n → α)) section variable (R) /-- This is `Matrix.of` bundled as a linear equivalence. -/ def ofLinearEquiv [Semiring R] [AddCommMonoid α] [Module R α] : (m → n → α) ≃ₗ[R] Matrix m n α where __ := ofAddEquiv map_smul' _ _ := rfl @[simp] lemma coe_ofLinearEquiv [Semiring R] [AddCommMonoid α] [Module R α] : ⇑(ofLinearEquiv _ : (m → n → α) ≃ₗ[R] Matrix m n α) = of := rfl @[simp] lemma coe_ofLinearEquiv_symm [Semiring R] [AddCommMonoid α] [Module R α] : ⇑((ofLinearEquiv _).symm : Matrix m n α ≃ₗ[R] (m → n → α)) = of.symm := rfl end theorem sum_apply [AddCommMonoid α] (i : m) (j : n) (s : Finset β) (g : β → Matrix m n α) : (∑ c ∈ s, g c) i j = ∑ c ∈ s, g c i j := (congr_fun (s.sum_apply i g) j).trans (s.sum_apply j _) end Matrix open Matrix namespace Matrix section Diagonal variable [DecidableEq n] variable (n α) /-- `Matrix.diagonal` as an `AddMonoidHom`. -/ @[simps] def diagonalAddMonoidHom [AddZeroClass α] : (n → α) →+ Matrix n n α where toFun := diagonal map_zero' := diagonal_zero map_add' x y := (diagonal_add x y).symm variable (R) /-- `Matrix.diagonal` as a `LinearMap`. -/ @[simps] def diagonalLinearMap [Semiring R] [AddCommMonoid α] [Module R α] : (n → α) →ₗ[R] Matrix n n α := { diagonalAddMonoidHom n α with map_smul' := diagonal_smul } variable {n α R} section One variable [Zero α] [One α] lemma zero_le_one_elem [Preorder α] [ZeroLEOneClass α] (i j : n) : 0 ≤ (1 : Matrix n n α) i j := by by_cases hi : i = j · subst hi simp · simp [hi] lemma zero_le_one_row [Preorder α] [ZeroLEOneClass α] (i : n) : 0 ≤ (1 : Matrix n n α) i := zero_le_one_elem i end One end Diagonal section Diag variable (n α) /-- `Matrix.diag` as an `AddMonoidHom`. -/ @[simps] def diagAddMonoidHom [AddZeroClass α] : Matrix n n α →+ n → α where toFun := diag map_zero' := diag_zero map_add' := diag_add variable (R) /-- `Matrix.diag` as a `LinearMap`. -/ @[simps] def diagLinearMap [Semiring R] [AddCommMonoid α] [Module R α] : Matrix n n α →ₗ[R] n → α := { diagAddMonoidHom n α with map_smul' := diag_smul } variable {n α R} @[simp] theorem diag_list_sum [AddMonoid α] (l : List (Matrix n n α)) : diag l.sum = (l.map diag).sum := map_list_sum (diagAddMonoidHom n α) l @[simp] theorem diag_multiset_sum [AddCommMonoid α] (s : Multiset (Matrix n n α)) : diag s.sum = (s.map diag).sum := map_multiset_sum (diagAddMonoidHom n α) s @[simp] theorem diag_sum {ι} [AddCommMonoid α] (s : Finset ι) (f : ι → Matrix n n α) : diag (∑ i ∈ s, f i) = ∑ i ∈ s, diag (f i) := map_sum (diagAddMonoidHom n α) f s end Diag open Matrix section AddCommMonoid variable [AddCommMonoid α] [Mul α] end AddCommMonoid section NonAssocSemiring variable [NonAssocSemiring α] variable (α n) /-- `Matrix.diagonal` as a `RingHom`. -/ @[simps] def diagonalRingHom [Fintype n] [DecidableEq n] : (n → α) →+* Matrix n n α := { diagonalAddMonoidHom n α with toFun := diagonal map_one' := diagonal_one map_mul' := fun _ _ => (diagonal_mul_diagonal' _ _).symm } end NonAssocSemiring section Semiring variable [Semiring α] theorem diagonal_pow [Fintype n] [DecidableEq n] (v : n → α) (k : ℕ) : diagonal v ^ k = diagonal (v ^ k) := (map_pow (diagonalRingHom n α) v k).symm /-- The ring homomorphism `α →+* Matrix n n α` sending `a` to the diagonal matrix with `a` on the diagonal. -/ def scalar (n : Type u) [DecidableEq n] [Fintype n] : α →+* Matrix n n α := (diagonalRingHom n α).comp <\| Pi.constRingHom n α section Scalar variable [DecidableEq n] [Fintype n] @[simp] theorem scalar_apply (a : α) : scalar n a = diagonal fun _ => a := rfl theorem scalar_inj [Nonempty n] {r s : α} : scalar n r = scalar n s ↔ r = s := (diagonal_injective.comp Function.const_injective).eq_iff theorem scalar_commute_iff {r : α} {M : Matrix n n α} : Commute (scalar n r) M ↔ r • M = MulOpposite.op r • M := by simp_rw [Commute, SemiconjBy, scalar_apply, ← smul_eq_diagonal_mul, ← op_smul_eq_mul_diagonal] theorem scalar_commute (r : α) (hr : ∀ r', Commute r r') (M : Matrix n n α) : Commute (scalar n r) M := scalar_commute_iff.2 <\| ext fun _ _ => hr _ end Scalar end Semiring section Algebra variable [Fintype n] [DecidableEq n] variable [CommSemiring R] [Semiring α] [Semiring β] [Algebra R α] [Algebra R β] instance instAlgebra : Algebra R (Matrix n n α) where algebraMap := (Matrix.scalar n).comp (algebraMap R α) commutes' _ _ := scalar_commute _ (fun _ => Algebra.commutes _ _) _ smul_def' r x := by ext; simp [Matrix.scalar, Algebra.smul_def r] theorem algebraMap_matrix_apply {r : R} {i j : n} : algebraMap R (Matrix n n α) r i j = if i = j then algebraMap R α r else 0 := by dsimp [algebraMap, Algebra.algebraMap, Matrix.scalar] split_ifs with h <;> simp [h, Matrix.one_apply_ne] theorem algebraMap_eq_diagonal (r : R) : algebraMap R (Matrix n n α) r = diagonal (algebraMap R (n → α) r) := rfl theorem algebraMap_eq_diagonalRingHom : algebraMap R (Matrix n n α) = (diagonalRingHom n α).comp (algebraMap R _) := rfl @[simp] theorem map_algebraMap (r : R) (f : α → β) (hf : f 0 = 0) (hf₂ : f (algebraMap R α r) = algebraMap R β r) : (algebraMap R (Matrix n n α) r).map f = algebraMap R (Matrix n n β) r := by rw [algebraMap_eq_diagonal, algebraMap_eq_diagonal, diagonal_map hf] simp [hf₂] variable (R) /-- `Matrix.diagonal` as an `AlgHom`. -/ @[simps] def diagonalAlgHom : (n → α) →ₐ[R] Matrix n n α := { diagonalRingHom n α with toFun := diagonal commutes' := fun r => (algebraMap_eq_diagonal r).symm } end Algebra section AddHom variable [Add α] variable (R α) in /-- Extracting entries from a matrix as an additive homomorphism. -/ @[simps] def entryAddHom (i : m) (j : n) : AddHom (Matrix m n α) α where toFun M := M i j map_add' _ _ := rfl -- It is necessary to spell out the name of the coercion explicitly on the RHS -- for unification to succeed lemma entryAddHom_eq_comp {i : m} {j : n} : entryAddHom α i j = ((Pi.evalAddHom (fun _ => α) j).comp (Pi.evalAddHom _ i)).comp (AddHomClass.toAddHom ofAddEquiv.symm) := rfl end AddHom section AddMonoidHom variable [AddZeroClass α] variable (R α) in /-- Extracting entries from a matrix as an additive monoid homomorphism. Note this cannot be upgraded to a ring homomorphism, as it does not respect multiplication. -/ @[simps] def entryAddMonoidHom (i : m) (j : n) : Matrix m n α →+ α where toFun M := M i j map_add' _ _ := rfl map_zero' := rfl -- It is necessary to spell out the name of the coercion explicitly on the RHS -- for unification to succeed lemma entryAddMonoidHom_eq_comp {i : m} {j : n} : entryAddMonoidHom α i j = ((Pi.evalAddMonoidHom (fun _ => α) j).comp (Pi.evalAddMonoidHom _ i)).comp (AddMonoidHomClass.toAddMonoidHom ofAddEquiv.symm) := by rfl @[simp] lemma evalAddMonoidHom_comp_diagAddMonoidHom (i : m) : (Pi.evalAddMonoidHom _ i).comp (diagAddMonoidHom m α) = entryAddMonoidHom α i i := by simp [AddMonoidHom.ext_iff] @[simp] lemma entryAddMonoidHom_toAddHom {i : m} {j : n} : (entryAddMonoidHom α i j : AddHom _ _) = entryAddHom α i j := rfl end AddMonoidHom section LinearMap variable [Semiring R] [AddCommMonoid α] [Module R α] variable (R α) in /-- Extracting entries from a matrix as a linear map. Note this cannot be upgraded to an algebra homomorphism, as it does not respect multiplication. -/ @[simps] def entryLinearMap (i : m) (j : n) : Matrix m n α →ₗ[R] α where toFun M := M i j map_add' _ _ := rfl map_smul' _ _ := rfl -- It is necessary to spell out the name of the coercion explicitly on the RHS -- for unification to succeed lemma entryLinearMap_eq_comp {i : m} {j : n} : entryLinearMap R α i j = LinearMap.proj j ∘ₗ LinearMap.proj i ∘ₗ (ofLinearEquiv R).symm.toLinearMap := by rfl @[simp] lemma proj_comp_diagLinearMap (i : m) : LinearMap.proj i ∘ₗ diagLinearMap m R α = entryLinearMap R α i i := by simp [LinearMap.ext_iff] @[simp] lemma entryLinearMap_toAddMonoidHom {i : m} {j : n} : (entryLinearMap R α i j : _ →+ _) = entryAddMonoidHom α i j := rfl @[simp] lemma entryLinearMap_toAddHom {i : m} {j : n} : (entryLinearMap R α i j : AddHom _ _) = entryAddHom α i j := rfl end LinearMap end Matrix /-! ### Bundled versions of `Matrix.map` -/ namespace Equiv /-- The `Equiv` between spaces of matrices induced by an `Equiv` between their coefficients. This is `Matrix.map` as an `Equiv`. -/ @[simps apply] def mapMatrix (f : α ≃ β) : Matrix m n α ≃ Matrix m n β where toFun M := M.map f invFun M := M.map f.symm left_inv _ := Matrix.ext fun _ _ => f.symm_apply_apply _ right_inv _ := Matrix.ext fun _ _ => f.apply_symm_apply _ @[simp] theorem mapMatrix_refl : (Equiv.refl α).mapMatrix = Equiv.refl (Matrix m n α) := rfl @[simp] theorem mapMatrix_symm (f : α ≃ β) : f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m n β ≃ _) := rfl @[simp] theorem mapMatrix_trans (f : α ≃ β) (g : β ≃ γ) : f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m n α ≃ _) := rfl end Equiv namespace AddMonoidHom variable [AddZeroClass α] [AddZeroClass β] [AddZeroClass γ] /-- The `AddMonoidHom` between spaces of matrices induced by an `AddMonoidHom` between their coefficients. This is `Matrix.map` as an `AddMonoidHom`. -/ @[simps] def mapMatrix (f : α →+ β) : Matrix m n α →+ Matrix m n β where toFun M := M.map f map_zero' := Matrix.map_zero f f.map_zero map_add' := Matrix.map_add f f.map_add @[simp] theorem mapMatrix_id : (AddMonoidHom.id α).mapMatrix = AddMonoidHom.id (Matrix m n α) := rfl @[simp] theorem mapMatrix_comp (f : β →+ γ) (g : α →+ β) : f.mapMatrix.comp g.mapMatrix = ((f.comp g).mapMatrix : Matrix m n α →+ _) := rfl @[simp] lemma entryAddMonoidHom_comp_mapMatrix (f : α →+ β) (i : m) (j : n) : (entryAddMonoidHom β i j).comp f.mapMatrix = f.comp (entryAddMonoidHom α i j) := rfl end AddMonoidHom namespace AddEquiv variable [Add α] [Add β] [Add γ] /-- The `AddEquiv` between spaces of matrices induced by an `AddEquiv` between their coefficients. This is `Matrix.map` as an `AddEquiv`. -/ @[simps apply] def mapMatrix (f : α ≃+ β) : Matrix m n α ≃+ Matrix m n β := { f.toEquiv.mapMatrix with toFun := fun M => M.map f invFun := fun M => M.map f.symm map_add' := Matrix.map_add f (map_add f) } @[simp] theorem mapMatrix_refl : (AddEquiv.refl α).mapMatrix = AddEquiv.refl (Matrix m n α) := rfl @[simp] theorem mapMatrix_symm (f : α ≃+ β) : f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m n β ≃+ _) := rfl @[simp] theorem mapMatrix_trans (f : α ≃+ β) (g : β ≃+ γ) : f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m n α ≃+ _) := rfl @[simp] lemma entryAddHom_comp_mapMatrix (f : α ≃+ β) (i : m) (j : n) : (entryAddHom β i j).comp (AddHomClass.toAddHom f.mapMatrix) = (f : AddHom α β).comp (entryAddHom _ i j) := rfl end AddEquiv namespace LinearMap variable [Semiring R] [AddCommMonoid α] [AddCommMonoid β] [AddCommMonoid γ] variable [Module R α] [Module R β] [Module R γ] /-- The `LinearMap` between spaces of matrices induced by a `LinearMap` between their coefficients. This is `Matrix.map` as a `LinearMap`. -/ @[simps] def mapMatrix (f : α →ₗ[R] β) : Matrix m n α →ₗ[R] Matrix m n β where toFun M := M.map f map_add' := Matrix.map_add f f.map_add map_smul' r := Matrix.map_smul f r (f.map_smul r) @[simp] theorem mapMatrix_id : LinearMap.id.mapMatrix = (LinearMap.id : Matrix m n α →ₗ[R] _) := rfl @[simp] theorem mapMatrix_comp (f : β →ₗ[R] γ) (g : α →ₗ[R] β) : f.mapMatrix.comp g.mapMatrix = ((f.comp g).mapMatrix : Matrix m n α →ₗ[R] _) := rfl @[simp] lemma entryLinearMap_comp_mapMatrix (f : α →ₗ[R] β) (i : m) (j : n) : entryLinearMap R _ i j ∘ₗ f.mapMatrix = f ∘ₗ entryLinearMap R _ i j := rfl end LinearMap namespace LinearEquiv variable [Semiring R] [AddCommMonoid α] [AddCommMonoid β] [AddCommMonoid γ] variable [Module R α] [Module R β] [Module R γ] /-- The `LinearEquiv` between spaces of matrices induced by a `LinearEquiv` between their coefficients. This is `Matrix.map` as a `LinearEquiv`. -/ @[simps apply] def mapMatrix (f : α ≃ₗ[R] β) : Matrix m n α ≃ₗ[R] Matrix m n β := { f.toEquiv.mapMatrix, f.toLinearMap.mapMatrix with toFun := fun M => M.map f invFun := fun M => M.map f.symm } @[simp] theorem mapMatrix_refl : (LinearEquiv.refl R α).mapMatrix = LinearEquiv.refl R (Matrix m n α) := rfl @[simp] theorem mapMatrix_symm (f : α ≃ₗ[R] β) : f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m n β ≃ₗ[R] _) := rfl @[simp] theorem mapMatrix_trans (f : α ≃ₗ[R] β) (g : β ≃ₗ[R] γ) : f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m n α ≃ₗ[R] _) := rfl @[simp] lemma mapMatrix_toLinearMap (f : α ≃ₗ[R] β) : (f.mapMatrix : _ ≃ₗ[R] Matrix m n β).toLinearMap = f.toLinearMap.mapMatrix := by rfl @[simp] lemma entryLinearMap_comp_mapMatrix (f : α ≃ₗ[R] β) (i : m) (j : n) : entryLinearMap R _ i j ∘ₗ f.mapMatrix.toLinearMap = f.toLinearMap ∘ₗ entryLinearMap R _ i j := by simp only [mapMatrix_toLinearMap, LinearMap.entryLinearMap_comp_mapMatrix] end LinearEquiv namespace RingHom variable [Fintype m] [DecidableEq m] variable [NonAssocSemiring α] [NonAssocSemiring β] [NonAssocSemiring γ] /-- The `RingHom` between spaces of square matrices induced by a `RingHom` between their coefficients. This is `Matrix.map` as a `RingHom`. -/ @[simps] def mapMatrix (f : α →+* β) : Matrix m m α →+* Matrix m m β := { f.toAddMonoidHom.mapMatrix with toFun := fun M => M.map f map_one' := by simp map_mul' := fun _ _ => Matrix.map_mul } @[simp] theorem mapMatrix_id : (RingHom.id α).mapMatrix = RingHom.id (Matrix m m α) := rfl @[simp] theorem mapMatrix_comp (f : β →+* γ) (g : α →+* β) : f.mapMatrix.comp g.mapMatrix = ((f.comp g).mapMatrix : Matrix m m α →+* _) := rfl end RingHom namespace RingEquiv variable [Fintype m] [DecidableEq m] variable [NonAssocSemiring α] [NonAssocSemiring β] [NonAssocSemiring γ] /-- The `RingEquiv` between spaces of square matrices induced by a `RingEquiv` between their coefficients. This is `Matrix.map` as a `RingEquiv`. -/ @[simps apply] def mapMatrix (f : α ≃+* β) : Matrix m m α ≃+* Matrix m m β := { f.toRingHom.mapMatrix, f.toAddEquiv.mapMatrix with toFun := fun M => M.map f invFun := fun M => M.map f.symm } @[simp] theorem mapMatrix_refl : (RingEquiv.refl α).mapMatrix = RingEquiv.refl (Matrix m m α) := rfl @[simp] theorem mapMatrix_symm (f : α ≃+* β) : f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m m β ≃+* _) := rfl @[simp] theorem mapMatrix_trans (f : α ≃+* β) (g : β ≃+* γ) : f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m m α ≃+* _) := rfl open MulOpposite in /-- For any ring `R`, we have ring isomorphism `Matₙₓₙ(Rᵒᵖ) ≅ (Matₙₓₙ(R))ᵒᵖ` given by transpose. -/ @[simps apply symm_apply] def mopMatrix : Matrix m m αᵐᵒᵖ ≃+* (Matrix m m α)ᵐᵒᵖ where toFun M := op (M.transpose.map unop) invFun M := M.unop.transpose.map op left_inv _ := by aesop right_inv _ := by aesop map_mul' _ _ := unop_injective <\| by ext; simp [transpose, mul_apply] map_add' _ _ := by aesop end RingEquiv namespace AlgHom variable [Fintype m] [DecidableEq m] variable [CommSemiring R] [Semiring α] [Semiring β] [Semiring γ] variable [Algebra R α] [Algebra R β] [Algebra R γ] /-- The `AlgHom` between spaces of square matrices induced by an `AlgHom` between their coefficients. This is `Matrix.map` as an `AlgHom`. -/ @[simps] def mapMatrix (f : α →ₐ[R] β) : Matrix m m α →ₐ[R] Matrix m m β := { f.toRingHom.mapMatrix with toFun := fun M => M.map f commutes' := fun r => Matrix.map_algebraMap r f (map_zero _) (f.commutes r) } @[simp] theorem mapMatrix_id : (AlgHom.id R α).mapMatrix = AlgHom.id R (Matrix m m α) := rfl @[simp] theorem mapMatrix_comp (f : β →ₐ[R] γ) (g : α →ₐ[R] β) : f.mapMatrix.comp g.mapMatrix = ((f.comp g).mapMatrix : Matrix m m α →ₐ[R] _) := rfl end AlgHom namespace AlgEquiv variable [Fintype m] [DecidableEq m] variable [CommSemiring R] [Semiring α] [Semiring β] [Semiring γ] variable [Algebra R α] [Algebra R β] [Algebra R γ] /-- The `AlgEquiv` between spaces of square matrices induced by an `AlgEquiv` between their coefficients. This is `Matrix.map` as an `AlgEquiv`. -/ @[simps apply] def mapMatrix (f : α ≃ₐ[R] β) : Matrix m m α ≃ₐ[R] Matrix m m β := { f.toAlgHom.mapMatrix, f.toRingEquiv.mapMatrix with toFun := fun M => M.map f invFun := fun M => M.map f.symm } @[simp] theorem mapMatrix_refl : AlgEquiv.refl.mapMatrix = (AlgEquiv.refl : Matrix m m α ≃ₐ[R] _) := rfl @[simp] theorem mapMatrix_symm (f : α ≃ₐ[R] β) : f.mapMatrix.symm = (f.symm.mapMatrix : Matrix m m β ≃ₐ[R] _) := rfl @[simp] theorem mapMatrix_trans (f : α ≃ₐ[R] β) (g : β ≃ₐ[R] γ) : f.mapMatrix.trans g.mapMatrix = ((f.trans g).mapMatrix : Matrix m m α ≃ₐ[R] _) := rfl /-- For any algebra `α` over a ring `R`, we have an `R`-algebra isomorphism `Matₙₓₙ(αᵒᵖ) ≅ (Matₙₓₙ(R))ᵒᵖ` given by transpose. If `α` is commutative, we can get rid of the `ᵒᵖ` in the left-hand side, see `Matrix.transposeAlgEquiv`. -/ @[simps!] def mopMatrix : Matrix m m αᵐᵒᵖ ≃ₐ[R] (Matrix m m α)ᵐᵒᵖ where __ := RingEquiv.mopMatrix commutes' _ := MulOpposite.unop_injective <\| by ext; simp [algebraMap_matrix_apply, eq_comm, apply_ite MulOpposite.unop] end AlgEquiv open Matrix namespace Matrix section Transpose open Matrix variable (m n α) /-- `Matrix.transpose` as an `AddEquiv` -/ @[simps apply] def transposeAddEquiv [Add α] : Matrix m n α ≃+ Matrix n m α where toFun := transpose invFun := transpose left_inv := transpose_transpose right_inv := transpose_transpose map_add' := transpose_add @[simp] theorem transposeAddEquiv_symm [Add α] : (transposeAddEquiv m n α).symm = transposeAddEquiv n m α := rfl variable {m n α} theorem transpose_list_sum [AddMonoid α] (l : List (Matrix m n α)) : l.sumᵀ = (l.map transpose).sum := map_list_sum (transposeAddEquiv m n α) l theorem transpose_multiset_sum [AddCommMonoid α] (s : Multiset (Matrix m n α)) : s.sumᵀ = (s.map transpose).sum := (transposeAddEquiv m n α).toAddMonoidHom.map_multiset_sum s theorem transpose_sum [AddCommMonoid α] {ι : Type} (s : Finset ι) (M : ι → Matrix m n α) : (∑ i ∈ s, M i)ᵀ = ∑ i ∈ s, (M i)ᵀ := map_sum (transposeAddEquiv m n α) _ s variable (m n R α) /-- `Matrix.transpose` as a `LinearMap` -/ @[simps apply] def transposeLinearEquiv [Semiring R] [AddCommMonoid α] [Module R α] : Matrix m n α ≃ₗ[R] Matrix n m α := { transposeAddEquiv m n α with map_smul' := transpose_smul } @[simp] theorem transposeLinearEquiv_symm [Semiring R] [AddCommMonoid α] [Module R α] : (transposeLinearEquiv m n R α).symm = transposeLinearEquiv n m R α := rfl variable {m n R α} variable (m α) /-- `Matrix.transpose` as a `RingEquiv` to the opposite ring -/ @[simps] def transposeRingEquiv [AddCommMonoid α] [CommSemigroup α] [Fintype m] : Matrix m m α ≃+ (Matrix m m α)ᵐᵒᵖ := { (transposeAddEquiv m m α).trans MulOpposite.opAddEquiv with toFun := fun M => MulOpposite.op Mᵀ invFun := fun M => M.unopᵀ map_mul' := fun M N => (congr_arg MulOpposite.op (transpose_mul M N)).trans (MulOpposite.op_mul _ _) left_inv := fun M => transpose_transpose M right_inv := fun M => MulOpposite.unop_injective <\| transpose_transpose M.unop } variable {m α} @[simp] theorem transpose_pow [CommSemiring α] [Fintype m] [DecidableEq m] (M : Matrix m m α) (k : ℕ) : (M ^ k)ᵀ = Mᵀ ^ k := MulOpposite.op_injective <\| map_pow (transposeRingEquiv m α) M k theorem transpose_list_prod [CommSemiring α] [Fintype m] [DecidableEq m] (l : List (Matrix m m α)) : l.prodᵀ = (l.map transpose).reverse.prod := (transposeRingEquiv m α).unop_map_list_prod l variable (R m α) /-- `Matrix.transpose` as an `AlgEquiv` to the opposite ring -/ @[simps] def transposeAlgEquiv [CommSemiring R] [CommSemiring α] [Fintype m] [DecidableEq m] [Algebra R α] : Matrix m m α ≃ₐ[R] (Matrix m m α)ᵐᵒᵖ := { (transposeAddEquiv m m α).trans MulOpposite.opAddEquiv, transposeRingEquiv m α with toFun := fun M => MulOpposite.op Mᵀ commutes' := fun r => by simp only [algebraMap_eq_diagonal, diagonal_transpose, MulOpposite.algebraMap_apply] } variable {R m α} end Transpose end Matrix		Mathlib/Data/Matrix/Basic.lean	1,745	1,748
/- Copyright (c) 2019 Kevin Buzzard. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Kevin Buzzard -/ import Mathlib.Data.EReal.Basic deprecated_module (since := "2025-04-13")		Mathlib/Data/Real/EReal.lean	1,636	1,641
/- Copyright (c) 2016 Jeremy Avigad. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jeremy Avigad, Leonardo de Moura, Mario Carneiro, Yaël Dillies, Yuyang Zhao -/ import Mathlib.Algebra.Order.Ring.Unbundled.Basic import Mathlib.Algebra.CharZero.Defs import Mathlib.Algebra.Order.Group.Defs import Mathlib.Algebra.Order.GroupWithZero.Unbundled.Basic import Mathlib.Algebra.Order.Monoid.NatCast import Mathlib.Algebra.Order.Monoid.Unbundled.MinMax import Mathlib.Algebra.Ring.Defs import Mathlib.Tactic.Tauto import Mathlib.Algebra.Order.Monoid.Unbundled.ExistsOfLE /-! # Ordered rings and semirings This file develops the basics of ordered (semi)rings. Each typeclass here comprises * an algebraic class (`Semiring`, `CommSemiring`, `Ring`, `CommRing`) * an order class (`PartialOrder`, `LinearOrder`) * assumptions on how both interact ((strict) monotonicity, canonicity) For short, * "`+` respects `≤`" means "monotonicity of addition" * "`+` respects `<`" means "strict monotonicity of addition" * "`` respects `≤`" means "monotonicity of multiplication by a nonnegative number". "`` respects `<`" means "strict monotonicity of multiplication by a positive number". ## Typeclasses `OrderedSemiring`: Semiring with a partial order such that `+` and `` respect `≤`. `StrictOrderedSemiring`: Nontrivial semiring with a partial order such that `+` and `` respects `<`. `OrderedCommSemiring`: Commutative semiring with a partial order such that `+` and `` respect `≤`. `StrictOrderedCommSemiring`: Nontrivial commutative semiring with a partial order such that `+` and `` respect `<`. `OrderedRing`: Ring with a partial order such that `+` respects `≤` and `` respects `<`. `OrderedCommRing`: Commutative ring with a partial order such that `+` respects `≤` and `` respects `<`. `LinearOrderedSemiring`: Nontrivial semiring with a linear order such that `+` respects `≤` and `` respects `<`. `LinearOrderedCommSemiring`: Nontrivial commutative semiring with a linear order such that `+` respects `≤` and `` respects `<`. `LinearOrderedRing`: Nontrivial ring with a linear order such that `+` respects `≤` and `` respects `<`. `LinearOrderedCommRing`: Nontrivial commutative ring with a linear order such that `+` respects `≤` and `` respects `<`. ## Hierarchy The hardest part of proving order lemmas might be to figure out the correct generality and its corresponding typeclass. Here's an attempt at demystifying it. For each typeclass, we list its immediate predecessors and what conditions are added to each of them. `OrderedSemiring` - `OrderedAddCommMonoid` & multiplication & `` respects `≤` - `Semiring` & partial order structure & `+` respects `≤` & `` respects `≤` * `StrictOrderedSemiring` - `OrderedCancelAddCommMonoid` & multiplication & `` respects `<` & nontriviality - `OrderedSemiring` & `+` respects `<` & `` respects `<` & nontriviality * `OrderedCommSemiring` - `OrderedSemiring` & commutativity of multiplication - `CommSemiring` & partial order structure & `+` respects `≤` & `` respects `<` `StrictOrderedCommSemiring` - `StrictOrderedSemiring` & commutativity of multiplication - `OrderedCommSemiring` & `+` respects `<` & `` respects `<` & nontriviality `OrderedRing` - `OrderedSemiring` & additive inverses - `OrderedAddCommGroup` & multiplication & `` respects `<` - `Ring` & partial order structure & `+` respects `≤` & `` respects `<` * `StrictOrderedRing` - `StrictOrderedSemiring` & additive inverses - `OrderedSemiring` & `+` respects `<` & `` respects `<` & nontriviality `OrderedCommRing` - `OrderedRing` & commutativity of multiplication - `OrderedCommSemiring` & additive inverses - `CommRing` & partial order structure & `+` respects `≤` & `` respects `<` `StrictOrderedCommRing` - `StrictOrderedCommSemiring` & additive inverses - `StrictOrderedRing` & commutativity of multiplication - `OrderedCommRing` & `+` respects `<` & `` respects `<` & nontriviality `LinearOrderedSemiring` - `StrictOrderedSemiring` & totality of the order - `LinearOrderedAddCommMonoid` & multiplication & nontriviality & `` respects `<` `LinearOrderedCommSemiring` - `StrictOrderedCommSemiring` & totality of the order - `LinearOrderedSemiring` & commutativity of multiplication * `LinearOrderedRing` - `StrictOrderedRing` & totality of the order - `LinearOrderedSemiring` & additive inverses - `LinearOrderedAddCommGroup` & multiplication & `` respects `<` - `Ring` & `IsDomain` & linear order structure `LinearOrderedCommRing` - `StrictOrderedCommRing` & totality of the order - `LinearOrderedRing` & commutativity of multiplication - `LinearOrderedCommSemiring` & additive inverses - `CommRing` & `IsDomain` & linear order structure -/ assert_not_exists MonoidHom open Function universe u variable {R : Type u} -- TODO: assume weaker typeclasses /-- An ordered semiring is a semiring with a partial order such that addition is monotone and multiplication by a nonnegative number is monotone. -/ class IsOrderedRing (R : Type) [Semiring R] [PartialOrder R] extends IsOrderedAddMonoid R, ZeroLEOneClass R where /-- In an ordered semiring, we can multiply an inequality `a ≤ b` on the left by a non-negative element `0 ≤ c` to obtain `c a ≤ c * b`. -/ protected mul_le_mul_of_nonneg_left : ∀ a b c : R, a ≤ b → 0 ≤ c → c * a ≤ c * b /-- In an ordered semiring, we can multiply an inequality `a ≤ b` on the right by a non-negative element `0 ≤ c` to obtain `a * c ≤ b * c`. -/ protected mul_le_mul_of_nonneg_right : ∀ a b c : R, a ≤ b → 0 ≤ c → a * c ≤ b * c attribute [instance 100] IsOrderedRing.toZeroLEOneClass /-- A strict ordered semiring is a nontrivial semiring with a partial order such that addition is strictly monotone and multiplication by a positive number is strictly monotone. -/ class IsStrictOrderedRing (R : Type) [Semiring R] [PartialOrder R] extends IsOrderedCancelAddMonoid R, ZeroLEOneClass R, Nontrivial R where /-- In a strict ordered semiring, we can multiply an inequality `a < b` on the left by a positive element `0 < c` to obtain `c a < c * b`. -/ protected mul_lt_mul_of_pos_left : ∀ a b c : R, a < b → 0 < c → c * a < c * b /-- In a strict ordered semiring, we can multiply an inequality `a < b` on the right by a positive element `0 < c` to obtain `a * c < b * c`. -/ protected mul_lt_mul_of_pos_right : ∀ a b c : R, a < b → 0 < c → a * c < b * c attribute [instance 100] IsStrictOrderedRing.toZeroLEOneClass attribute [instance 100] IsStrictOrderedRing.toNontrivial lemma IsOrderedRing.of_mul_nonneg [Ring R] [PartialOrder R] [IsOrderedAddMonoid R] [ZeroLEOneClass R] (mul_nonneg : ∀ a b : R, 0 ≤ a → 0 ≤ b → 0 ≤ a * b) : IsOrderedRing R where mul_le_mul_of_nonneg_left a b c ab hc := by simpa only [mul_sub, sub_nonneg] using mul_nonneg _ _ hc (sub_nonneg.2 ab) mul_le_mul_of_nonneg_right a b c ab hc := by simpa only [sub_mul, sub_nonneg] using mul_nonneg _ _ (sub_nonneg.2 ab) hc lemma IsStrictOrderedRing.of_mul_pos [Ring R] [PartialOrder R] [IsOrderedAddMonoid R] [ZeroLEOneClass R] [Nontrivial R] (mul_pos : ∀ a b : R, 0 < a → 0 < b → 0 < a * b) : IsStrictOrderedRing R where mul_lt_mul_of_pos_left a b c ab hc := by simpa only [mul_sub, sub_pos] using mul_pos _ _ hc (sub_pos.2 ab) mul_lt_mul_of_pos_right a b c ab hc := by simpa only [sub_mul, sub_pos] using mul_pos _ _ (sub_pos.2 ab) hc section IsOrderedRing variable [Semiring R] [PartialOrder R] [IsOrderedRing R] -- see Note [lower instance priority] instance (priority := 200) IsOrderedRing.toPosMulMono : PosMulMono R where elim x _ _ h := IsOrderedRing.mul_le_mul_of_nonneg_left _ _ _ h x.2 -- see Note [lower instance priority] instance (priority := 200) IsOrderedRing.toMulPosMono : MulPosMono R where elim x _ _ h := IsOrderedRing.mul_le_mul_of_nonneg_right _ _ _ h x.2 end IsOrderedRing /-- Turn an ordered domain into a strict ordered ring. -/ lemma IsOrderedRing.toIsStrictOrderedRing (R : Type) [Ring R] [PartialOrder R] [IsOrderedRing R] [NoZeroDivisors R] [Nontrivial R] : IsStrictOrderedRing R := .of_mul_pos fun _ _ ap bp ↦ (mul_nonneg ap.le bp.le).lt_of_ne' (mul_ne_zero ap.ne' bp.ne') section IsStrictOrderedRing variable [Semiring R] [PartialOrder R] [IsStrictOrderedRing R] -- see Note [lower instance priority] instance (priority := 200) IsStrictOrderedRing.toPosMulStrictMono : PosMulStrictMono R where elim x _ _ h := IsStrictOrderedRing.mul_lt_mul_of_pos_left _ _ _ h x.prop -- see Note [lower instance priority] instance (priority := 200) IsStrictOrderedRing.toMulPosStrictMono : MulPosStrictMono R where elim x _ _ h := IsStrictOrderedRing.mul_lt_mul_of_pos_right _ _ _ h x.prop -- see Note [lower instance priority] instance (priority := 100) IsStrictOrderedRing.toIsOrderedRing : IsOrderedRing R where __ := ‹IsStrictOrderedRing R› mul_le_mul_of_nonneg_left _ _ _ := mul_le_mul_of_nonneg_left mul_le_mul_of_nonneg_right _ _ _ := mul_le_mul_of_nonneg_right -- see Note [lower instance priority] instance (priority := 100) IsStrictOrderedRing.toCharZero : CharZero R where cast_injective := (strictMono_nat_of_lt_succ fun n ↦ by rw [Nat.cast_succ]; apply lt_add_one).injective -- see Note [lower instance priority] instance (priority := 100) IsStrictOrderedRing.toNoMaxOrder : NoMaxOrder R := ⟨fun a => ⟨a + 1, lt_add_of_pos_right _ one_pos⟩⟩ end IsStrictOrderedRing section LinearOrder variable [Semiring R] [LinearOrder R] [IsStrictOrderedRing R] [ExistsAddOfLE R] -- See note [lower instance priority] instance (priority := 100) IsStrictOrderedRing.noZeroDivisors : NoZeroDivisors R where eq_zero_or_eq_zero_of_mul_eq_zero {a b} hab := by contrapose! hab obtain ha \| ha := hab.1.lt_or_lt <;> obtain hb \| hb := hab.2.lt_or_lt exacts [(mul_pos_of_neg_of_neg ha hb).ne', (mul_neg_of_neg_of_pos ha hb).ne, (mul_neg_of_pos_of_neg ha hb).ne, (mul_pos ha hb).ne'] -- Note that we can't use `NoZeroDivisors.to_isDomain` since we are merely in a semiring. -- See note [lower instance priority] instance (priority := 100) IsStrictOrderedRing.isDomain : IsDomain R where mul_left_cancel_of_ne_zero {a b c} ha h := by obtain ha \| ha := ha.lt_or_lt exacts [(strictAnti_mul_left ha).injective h, (strictMono_mul_left_of_pos ha).injective h] mul_right_cancel_of_ne_zero {b a c} ha h := by obtain ha \| ha := ha.lt_or_lt exacts [(strictAnti_mul_right ha).injective h, (strictMono_mul_right_of_pos ha).injective h] end LinearOrder /-! Note that `OrderDual` does not satisfy any of the ordered ring typeclasses due to the `zero_le_one` field. -/ set_option linter.deprecated false in /-- An `OrderedSemiring` is a semiring with a partial order such that addition is monotone and multiplication by a nonnegative number is monotone. -/ @[deprecated "Use `[Semiring R] [PartialOrder R] [IsOrderedRing R]` instead." (since := "2025-04-10")] structure OrderedSemiring (R : Type u) extends Semiring R, OrderedAddCommMonoid R where /-- `0 ≤ 1` in any ordered semiring. -/ protected zero_le_one : (0 : R) ≤ 1 /-- In an ordered semiring, we can multiply an inequality `a ≤ b` on the left by a non-negative element `0 ≤ c` to obtain `c a ≤ c * b`. -/ protected mul_le_mul_of_nonneg_left : ∀ a b c : R, a ≤ b → 0 ≤ c → c * a ≤ c * b /-- In an ordered semiring, we can multiply an inequality `a ≤ b` on the right by a non-negative element `0 ≤ c` to obtain `a * c ≤ b * c`. -/ protected mul_le_mul_of_nonneg_right : ∀ a b c : R, a ≤ b → 0 ≤ c → a * c ≤ b * c set_option linter.deprecated false in /-- An `OrderedCommSemiring` is a commutative semiring with a partial order such that addition is monotone and multiplication by a nonnegative number is monotone. -/ @[deprecated "Use `[CommSemiring R] [PartialOrder R] [IsOrderedRing R]` instead." (since := "2025-04-10")] structure OrderedCommSemiring (R : Type u) extends OrderedSemiring R, CommSemiring R where mul_le_mul_of_nonneg_right a b c ha hc := -- parentheses ensure this generates an `optParam` rather than an `autoParam` (by simpa only [mul_comm] using mul_le_mul_of_nonneg_left a b c ha hc) set_option linter.deprecated false in /-- An `OrderedRing` is a ring with a partial order such that addition is monotone and multiplication by a nonnegative number is monotone. -/ @[deprecated "Use `[Ring R] [PartialOrder R] [IsOrderedRing R]` instead." (since := "2025-04-10")] structure OrderedRing (R : Type u) extends Ring R, OrderedAddCommGroup R where /-- `0 ≤ 1` in any ordered ring. -/ protected zero_le_one : 0 ≤ (1 : R) /-- The product of non-negative elements is non-negative. -/ protected mul_nonneg : ∀ a b : R, 0 ≤ a → 0 ≤ b → 0 ≤ a * b set_option linter.deprecated false in /-- An `OrderedCommRing` is a commutative ring with a partial order such that addition is monotone and multiplication by a nonnegative number is monotone. -/ @[deprecated "Use `[CommRing R] [PartialOrder R] [IsOrderedRing R]` instead." (since := "2025-04-10")] structure OrderedCommRing (R : Type u) extends OrderedRing R, CommRing R set_option linter.deprecated false in /-- A `StrictOrderedSemiring` is a nontrivial semiring with a partial order such that addition is strictly monotone and multiplication by a positive number is strictly monotone. -/ @[deprecated "Use `[Semiring R] [PartialOrder R] [IsStrictOrderedRing R]` instead." (since := "2025-04-10")] structure StrictOrderedSemiring (R : Type u) extends Semiring R, OrderedCancelAddCommMonoid R, Nontrivial R where /-- In a strict ordered semiring, `0 ≤ 1`. -/ protected zero_le_one : (0 : R) ≤ 1 /-- Left multiplication by a positive element is strictly monotone. -/ protected mul_lt_mul_of_pos_left : ∀ a b c : R, a < b → 0 < c → c * a < c * b /-- Right multiplication by a positive element is strictly monotone. -/ protected mul_lt_mul_of_pos_right : ∀ a b c : R, a < b → 0 < c → a * c < b * c set_option linter.deprecated false in /-- A `StrictOrderedCommSemiring` is a commutative semiring with a partial order such that addition is strictly monotone and multiplication by a positive number is strictly monotone. -/ @[deprecated "Use `[CommSemiring R] [PartialOrder R] [IsStrictOrderedRing R]` instead." (since := "2025-04-10")] structure StrictOrderedCommSemiring (R : Type u) extends StrictOrderedSemiring R, CommSemiring R set_option linter.deprecated false in /-- A `StrictOrderedRing` is a ring with a partial order such that addition is strictly monotone and multiplication by a positive number is strictly monotone. -/ @[deprecated "Use `[Ring R] [PartialOrder R] [IsStrictOrderedRing R]` instead." (since := "2025-04-10")] structure StrictOrderedRing (R : Type u) extends Ring R, OrderedAddCommGroup R, Nontrivial R where /-- In a strict ordered ring, `0 ≤ 1`. -/ protected zero_le_one : 0 ≤ (1 : R) /-- The product of two positive elements is positive. -/ protected mul_pos : ∀ a b : R, 0 < a → 0 < b → 0 < a * b set_option linter.deprecated false in /-- A `StrictOrderedCommRing` is a commutative ring with a partial order such that addition is strictly monotone and multiplication by a positive number is strictly monotone. -/ @[deprecated "Use `[CommRing R] [PartialOrder R] [IsStrictOrderedRing R]` instead." (since := "2025-04-10")] structure StrictOrderedCommRing (R : Type) extends StrictOrderedRing R, CommRing R /- It's not entirely clear we should assume `Nontrivial` at this point; it would be reasonable to explore changing this, but be warned that the instances involving `Domain` may cause typeclass search loops. -/ set_option linter.deprecated false in /-- A `LinearOrderedSemiring` is a nontrivial semiring with a linear order such that addition is monotone and multiplication by a positive number is strictly monotone. -/ @[deprecated "Use `[Semiring R] [LinearOrder R] [IsStrictOrderedRing R]` instead." (since := "2025-04-10")] structure LinearOrderedSemiring (R : Type u) extends StrictOrderedSemiring R, LinearOrderedAddCommMonoid R set_option linter.deprecated false in /-- A `LinearOrderedCommSemiring` is a nontrivial commutative semiring with a linear order such that addition is monotone and multiplication by a positive number is strictly monotone. -/ @[deprecated "Use `[CommSemiring R] [LinearOrder R] [IsStrictOrderedRing R]` instead." (since := "2025-04-10")] structure LinearOrderedCommSemiring (R : Type) extends StrictOrderedCommSemiring R, LinearOrderedSemiring R set_option linter.deprecated false in /-- A `LinearOrderedRing` is a ring with a linear order such that addition is monotone and multiplication by a positive number is strictly monotone. -/ @[deprecated "Use `[Ring R] [LinearOrder R] [IsStrictOrderedRing R]` instead." (since := "2025-04-10")] structure LinearOrderedRing (R : Type u) extends StrictOrderedRing R, LinearOrder R set_option linter.deprecated false in /-- A `LinearOrderedCommRing` is a commutative ring with a linear order such that addition is monotone and multiplication by a positive number is strictly monotone. -/ @[deprecated "Use `[CommRing R] [LinearOrder R] [IsStrictOrderedRing R]` instead." (since := "2025-04-10")] structure LinearOrderedCommRing (R : Type u) extends LinearOrderedRing R, CommMonoid R attribute [nolint docBlame] StrictOrderedSemiring.toOrderedCancelAddCommMonoid StrictOrderedCommSemiring.toCommSemiring LinearOrderedSemiring.toLinearOrderedAddCommMonoid LinearOrderedRing.toLinearOrder OrderedSemiring.toOrderedAddCommMonoid OrderedCommSemiring.toCommSemiring StrictOrderedCommRing.toCommRing OrderedRing.toOrderedAddCommGroup OrderedCommRing.toCommRing StrictOrderedRing.toOrderedAddCommGroup LinearOrderedCommSemiring.toLinearOrderedSemiring LinearOrderedCommRing.toCommMonoid section OrderedRing variable [Ring R] [PartialOrder R] [IsOrderedRing R] {a b c : R} lemma one_add_le_one_sub_mul_one_add (h : a + b + b * c ≤ c) : 1 + a ≤ (1 - b) * (1 + c) := by rw [one_sub_mul, mul_one_add, le_sub_iff_add_le, add_assoc, ← add_assoc a] gcongr lemma one_add_le_one_add_mul_one_sub (h : a + c + b * c ≤ b) : 1 + a ≤ (1 + b) * (1 - c) := by rw [mul_one_sub, one_add_mul, le_sub_iff_add_le, add_assoc, ← add_assoc a] gcongr lemma one_sub_le_one_sub_mul_one_add (h : b + b * c ≤ a + c) : 1 - a ≤ (1 - b) * (1 + c) := by rw [one_sub_mul, mul_one_add, sub_le_sub_iff, add_assoc, add_comm c] gcongr lemma one_sub_le_one_add_mul_one_sub (h : c + b * c ≤ a + b) : 1 - a ≤ (1 + b) * (1 - c) := by rw [mul_one_sub, one_add_mul, sub_le_sub_iff, add_assoc, add_comm b] gcongr end OrderedRing		Mathlib/Algebra/Order/Ring/Defs.lean	656	662
/- Copyright (c) 2019 Jan-David Salchow. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Jan-David Salchow, Sébastien Gouëzel, Jean Lo -/ import Mathlib.Analysis.NormedSpace.OperatorNorm.Bilinear import Mathlib.Analysis.NormedSpace.OperatorNorm.NNNorm import Mathlib.Analysis.Normed.Module.Span /-! # Operator norm for maps on normed spaces This file contains statements about operator norm for which it really matters that the underlying space has a norm (rather than just a seminorm). -/ suppress_compilation open Topology open scoped NNReal -- the `ₗ` subscript variables are for special cases about linear (as opposed to semilinear) maps variable {𝕜 𝕜₂ 𝕜₃ E F Fₗ G : Type} section Normed variable [NormedAddCommGroup E] [NormedAddCommGroup F] [NormedAddCommGroup G] [NormedAddCommGroup Fₗ] open Metric ContinuousLinearMap section variable [NontriviallyNormedField 𝕜] [NontriviallyNormedField 𝕜₂] [NontriviallyNormedField 𝕜₃] [NormedSpace 𝕜 E] [NormedSpace 𝕜₂ F] [NormedSpace 𝕜₃ G] [NormedSpace 𝕜 Fₗ] {σ₁₂ : 𝕜 →+ 𝕜₂} {σ₂₃ : 𝕜₂ →+* 𝕜₃} (f : E →SL[σ₁₂] F) namespace LinearMap theorem bound_of_shell [RingHomIsometric σ₁₂] (f : E →ₛₗ[σ₁₂] F) {ε C : ℝ} (ε_pos : 0 < ε) {c : 𝕜} (hc : 1 < ‖c‖) (hf : ∀ x, ε / ‖c‖ ≤ ‖x‖ → ‖x‖ < ε → ‖f x‖ ≤ C * ‖x‖) (x : E) : ‖f x‖ ≤ C * ‖x‖ := by by_cases hx : x = 0; · simp [hx] exact SemilinearMapClass.bound_of_shell_semi_normed f ε_pos hc hf (norm_ne_zero_iff.2 hx) /-- `LinearMap.bound_of_ball_bound'` is a version of this lemma over a field satisfying `RCLike` that produces a concrete bound. -/ theorem bound_of_ball_bound {r : ℝ} (r_pos : 0 < r) (c : ℝ) (f : E →ₗ[𝕜] Fₗ) (h : ∀ z ∈ Metric.ball (0 : E) r, ‖f z‖ ≤ c) : ∃ C, ∀ z : E, ‖f z‖ ≤ C * ‖z‖ := by	obtain ⟨k, hk⟩ := @NontriviallyNormedField.non_trivial 𝕜 _ use c * (‖k‖ / r) intro z refine bound_of_shell _ r_pos hk (fun x hko hxo => ?_) _ calc ‖f x‖ ≤ c := h _ (mem_ball_zero_iff.mpr hxo) _ ≤ c * (‖x‖ * ‖k‖ / r) := le_mul_of_one_le_right ?_ ?_ _ = _ := by ring · exact le_trans (norm_nonneg _) (h 0 (by simp [r_pos])) · rw [div_le_iff₀ (zero_lt_one.trans hk)] at hko exact (one_le_div r_pos).mpr hko theorem antilipschitz_of_comap_nhds_le [h : RingHomIsometric σ₁₂] (f : E →ₛₗ[σ₁₂] F)	Mathlib/Analysis/NormedSpace/OperatorNorm/NormedSpace.lean	52	64
/- 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 := ⟨fun hX ↦ h.ne (hB.eq_of_subset_indep hX h.subset), hX⟩ theorem IsBase.dep_of_insert (hB : M.IsBase B) (heB : e ∉ B) (he : e ∈ M.E := by aesop_mat) : M.Dep (insert e B) := hB.dep_of_ssubset (ssubset_insert heB) (insert_subset he hB.subset_ground) theorem IsBase.mem_of_insert_indep (hB : M.IsBase B) (heB : M.Indep (insert e B)) : e ∈ B := by_contra fun he ↦ (hB.dep_of_insert he (heB.subset_ground (mem_insert _ _))).not_indep heB /-- If the difference of two IsBases is a singleton, then they differ by an insertion/removal -/ theorem IsBase.eq_exchange_of_diff_eq_singleton (hB : M.IsBase B) (hB' : M.IsBase B') (h : B \ B' = {e}) : ∃ f ∈ B' \ B, B' = (insert f B) \ {e} := by obtain ⟨f, hf, hb⟩ := hB.exchange hB' (h.symm.subset (mem_singleton e)) have hne : f ≠ e := by rintro rfl; exact hf.2 (h.symm.subset (mem_singleton f)).1 rw [insert_diff_singleton_comm hne] at hb refine ⟨f, hf, (hb.eq_of_subset_isBase hB' ?_).symm⟩ rw [diff_subset_iff, insert_subset_iff, union_comm, ← diff_subset_iff, h, and_iff_left rfl.subset] exact Or.inl hf.1 theorem IsBase.exchange_isBase_of_indep (hB : M.IsBase B) (hf : f ∉ B) (hI : M.Indep (insert f (B \ {e}))) : M.IsBase (insert f (B \ {e})) := by obtain ⟨B', hB', hIB'⟩ := hI.exists_isBase_superset have hcard := hB'.encard_diff_comm hB rw [insert_subset_iff, ← diff_eq_empty, diff_diff_comm, diff_eq_empty, subset_singleton_iff_eq] at hIB' obtain ⟨hfB, (h \| h)⟩ := hIB' · rw [h, encard_empty, encard_eq_zero, eq_empty_iff_forall_not_mem] at hcard exact (hcard f ⟨hfB, hf⟩).elim rw [h, encard_singleton, encard_eq_one] at hcard obtain ⟨x, hx⟩ := hcard obtain (rfl : f = x) := hx.subset ⟨hfB, hf⟩ simp_rw [← h, ← singleton_union, ← hx, sdiff_sdiff_right_self, inf_eq_inter, inter_comm B, diff_union_inter] exact hB' theorem IsBase.exchange_isBase_of_indep' (hB : M.IsBase B) (he : e ∈ B) (hf : f ∉ B) (hI : M.Indep (insert f B \ {e})) : M.IsBase (insert f B \ {e}) := by have hfe : f ≠ e := ne_of_mem_of_not_mem he hf \|>.symm rw [← insert_diff_singleton_comm hfe] at * exact hB.exchange_isBase_of_indep hf hI lemma insert_isBase_of_insert_indep {M : Matroid α} {I : Set α} {e f : α} (he : e ∉ I) (hf : f ∉ I) (heI : M.IsBase (insert e I)) (hfI : M.Indep (insert f I)) : M.IsBase (insert f I) := by obtain rfl \| hef := eq_or_ne e f · assumption simpa [diff_singleton_eq_self he, hfI] using heI.exchange_isBase_of_indep (e := e) (f := f) (by simp [hef.symm, hf]) theorem IsBase.insert_dep (hB : M.IsBase B) (h : e ∈ M.E \ B) : M.Dep (insert e B) := by rw [← not_indep_iff (insert_subset h.1 hB.subset_ground)] exact h.2 ∘ (fun hi ↦ insert_eq_self.mp (hB.eq_of_subset_indep hi (subset_insert e B)).symm) theorem Indep.exists_insert_of_not_isBase (hI : M.Indep I) (hI' : ¬M.IsBase I) (hB : M.IsBase B) : ∃ e ∈ B \ I, M.Indep (insert e I) := by obtain ⟨B', hB', hIB'⟩ := hI.exists_isBase_superset obtain ⟨x, hxB', hx⟩ := exists_of_ssubset (hIB'.ssubset_of_ne (by (rintro rfl; exact hI' hB'))) by_cases hxB : x ∈ B · exact ⟨x, ⟨hxB, hx⟩, hB'.indep.subset (insert_subset hxB' hIB')⟩ obtain ⟨e,he, hBase⟩ := hB'.exchange hB ⟨hxB',hxB⟩ exact ⟨e, ⟨he.1, not_mem_subset hIB' he.2⟩, indep_iff.2 ⟨_, hBase, insert_subset_insert (subset_diff_singleton hIB' hx)⟩⟩ /-- This is the same as `Indep.exists_insert_of_not_isBase`, but phrased so that it is defeq to the augmentation axiom for independent sets. -/ theorem Indep.exists_insert_of_not_maximal (M : Matroid α) ⦃I B : Set α⦄ (hI : M.Indep I) (hInotmax : ¬ Maximal M.Indep I) (hB : Maximal M.Indep B) : ∃ x ∈ B \ I, M.Indep (insert x I) := by simp only [maximal_subset_iff, hI, not_and, not_forall, exists_prop, true_imp_iff] at hB hInotmax refine hI.exists_insert_of_not_isBase (fun hIb ↦ ?_) ?_ · obtain ⟨I', hII', hI', hne⟩ := hInotmax exact hne <\| hIb.eq_of_subset_indep hII' hI' exact hB.1.isBase_of_maximal fun J hJ hBJ ↦ hB.2 hJ hBJ theorem Indep.isBase_of_forall_insert (hB : M.Indep B) (hBmax : ∀ e ∈ M.E \ B, ¬ M.Indep (insert e B)) : M.IsBase B := by refine by_contra fun hnb ↦ ?_ obtain ⟨B', hB'⟩ := M.exists_isBase obtain ⟨e, he, h⟩ := hB.exists_insert_of_not_isBase hnb hB' exact hBmax e ⟨hB'.subset_ground he.1, he.2⟩ h theorem ground_indep_iff_isBase : M.Indep M.E ↔ M.IsBase M.E := ⟨fun h ↦ h.isBase_of_maximal (fun _ hJ hEJ ↦ hEJ.antisymm hJ.subset_ground), IsBase.indep⟩ theorem IsBase.exists_insert_of_ssubset (hB : M.IsBase B) (hIB : I ⊂ B) (hB' : M.IsBase B') : ∃ e ∈ B' \ I, M.Indep (insert e I) := (hB.indep.subset hIB.subset).exists_insert_of_not_isBase (fun hI ↦ hIB.ne (hI.eq_of_subset_isBase hB hIB.subset)) hB' @[ext] theorem ext_indep {M₁ M₂ : Matroid α} (hE : M₁.E = M₂.E) (h : ∀ ⦃I⦄, I ⊆ M₁.E → (M₁.Indep I ↔ M₂.Indep I)) : M₁ = M₂ := have h' : M₁.Indep = M₂.Indep := by ext I by_cases hI : I ⊆ M₁.E · rwa [h] exact iff_of_false (fun hi ↦ hI hi.subset_ground) (fun hi ↦ hI (hi.subset_ground.trans_eq hE.symm)) ext_isBase hE (fun B _ ↦ by simp_rw [isBase_iff_maximal_indep, h']) @[deprecated (since := "2024-12-25")] alias eq_of_indep_iff_indep_forall := ext_indep theorem ext_iff_indep {M₁ M₂ : Matroid α} : M₁ = M₂ ↔ (M₁.E = M₂.E) ∧ ∀ ⦃I⦄, I ⊆ M₁.E → (M₁.Indep I ↔ M₂.Indep I) := ⟨fun h ↦ by (subst h; simp), fun h ↦ ext_indep h.1 h.2⟩ @[deprecated (since := "2024-12-25")] alias eq_iff_indep_iff_indep_forall := ext_iff_indep /-- If every base of `M₁` is independent in `M₂` and vice versa, then `M₁ = M₂`. -/ lemma ext_isBase_indep {M₁ M₂ : Matroid α} (hE : M₁.E = M₂.E) (hM₁ : ∀ ⦃B⦄, M₁.IsBase B → M₂.Indep B) (hM₂ : ∀ ⦃B⦄, M₂.IsBase B → M₁.Indep B) : M₁ = M₂ := by refine ext_indep hE fun I hIE ↦ ⟨fun hI ↦ ?_, fun hI ↦ ?_⟩ · obtain ⟨B, hB, hIB⟩ := hI.exists_isBase_superset exact (hM₁ hB).subset hIB obtain ⟨B, hB, hIB⟩ := hI.exists_isBase_superset exact (hM₂ hB).subset hIB /-- A `Finitary` matroid is one where a set is independent if and only if it all its finite subsets are independent, or equivalently a matroid whose circuits are finite. -/ @[mk_iff] class Finitary (M : Matroid α) : Prop where /-- `I` is independent if all its finite subsets are independent. -/ indep_of_forall_finite : ∀ I, (∀ J, J ⊆ I → J.Finite → M.Indep J) → M.Indep I theorem indep_of_forall_finite_subset_indep {M : Matroid α} [Finitary M] (I : Set α) (h : ∀ J, J ⊆ I → J.Finite → M.Indep J) : M.Indep I := Finitary.indep_of_forall_finite I h theorem indep_iff_forall_finite_subset_indep {M : Matroid α} [Finitary M] : M.Indep I ↔ ∀ J, J ⊆ I → J.Finite → M.Indep J := ⟨fun h _ hJI _ ↦ h.subset hJI, Finitary.indep_of_forall_finite I⟩ instance finitary_of_rankFinite {M : Matroid α} [RankFinite M] : Finitary M where indep_of_forall_finite I hI := by refine I.finite_or_infinite.elim (hI _ Subset.rfl) (fun h ↦ False.elim ?_) obtain ⟨B, hB⟩ := M.exists_isBase obtain ⟨I₀, hI₀I, hI₀fin, hI₀card⟩ := h.exists_subset_ncard_eq (B.ncard + 1) obtain ⟨B', hB', hI₀B'⟩ := (hI _ hI₀I hI₀fin).exists_isBase_superset have hle := ncard_le_ncard hI₀B' hB'.finite rw [hI₀card, hB'.ncard_eq_ncard_of_isBase hB, Nat.add_one_le_iff] at hle exact hle.ne rfl /-- Matroids obey the maximality axiom -/ theorem existsMaximalSubsetProperty_indep (M : Matroid α) : ∀ X, X ⊆ M.E → ExistsMaximalSubsetProperty M.Indep X := M.maximality end dep_indep section copy /-- create a copy of `M : Matroid α` with independence and base predicates and ground set defeq to supplied arguments that are provably equal to those of `M`. -/ @[simps] def copy (M : Matroid α) (E : Set α) (IsBase Indep : Set α → Prop) (hE : E = M.E) (hB : ∀ B, IsBase B ↔ M.IsBase B) (hI : ∀ I, Indep I ↔ M.Indep I) : Matroid α where E := E IsBase := IsBase Indep := Indep indep_iff' _ := by simp_rw [hI, hB, M.indep_iff] exists_isBase := by simp_rw [hB] exact M.exists_isBase isBase_exchange := by simp_rw [show IsBase = M.IsBase from funext (by simp [hB])] exact M.isBase_exchange maximality := by simp_rw [hE, show Indep = M.Indep from funext (by simp [hI])] exact M.maximality subset_ground := by simp_rw [hE, hB] exact M.subset_ground /-- create a copy of `M : Matroid α` with an independence predicate and ground set defeq to supplied arguments that are provably equal to those of `M`. -/ @[simps!] def copyIndep (M : Matroid α) (E : Set α) (Indep : Set α → Prop) (hE : E = M.E) (h : ∀ I, Indep I ↔ M.Indep I) : Matroid α := M.copy E M.IsBase Indep hE (fun _ ↦ Iff.rfl) h /-- create a copy of `M : Matroid α` with a base predicate and ground set defeq to supplied arguments that are provably equal to those of `M`. -/ @[simps!] def copyBase (M : Matroid α) (E : Set α) (IsBase : Set α → Prop) (hE : E = M.E) (h : ∀ B, IsBase B ↔ M.IsBase B) : Matroid α := M.copy E IsBase M.Indep hE h (fun _ ↦ Iff.rfl) end copy section IsBasis /-- A Basis for a set `X ⊆ M.E` is a maximal independent subset of `X` (Often in the literature, the word 'Basis' is used to refer to what we call a 'Base'). -/ def IsBasis (M : Matroid α) (I X : Set α) : Prop := Maximal (fun A ↦ M.Indep A ∧ A ⊆ X) I ∧ X ⊆ M.E @[deprecated (since := "2025-02-14")] alias Basis := IsBasis /-- `Matroid.IsBasis' I X` is the same as `Matroid.IsBasis I X`, without the requirement that `X ⊆ M.E`. This is convenient for some API building, especially when working with rank and closure. -/ def IsBasis' (M : Matroid α) (I X : Set α) : Prop := Maximal (fun A ↦ M.Indep A ∧ A ⊆ X) I @[deprecated (since := "2025-02-14")] alias Basis' := IsBasis' variable {B I J X Y : Set α} {e : α} theorem IsBasis'.indep (hI : M.IsBasis' I X) : M.Indep I := hI.1.1 theorem IsBasis.indep (hI : M.IsBasis I X) : M.Indep I := hI.1.1.1 theorem IsBasis.subset (hI : M.IsBasis I X) : I ⊆ X := hI.1.1.2 theorem IsBasis.isBasis' (hI : M.IsBasis I X) : M.IsBasis' I X := hI.1 theorem IsBasis'.isBasis (hI : M.IsBasis' I X) (hX : X ⊆ M.E := by aesop_mat) : M.IsBasis I X := ⟨hI, hX⟩ theorem IsBasis'.subset (hI : M.IsBasis' I X) : I ⊆ X := hI.1.2 @[aesop unsafe 15% (rule_sets := [Matroid])] theorem IsBasis.subset_ground (hI : M.IsBasis I X) : X ⊆ M.E := hI.2 theorem IsBasis.isBasis_inter_ground (hI : M.IsBasis I X) : M.IsBasis I (X ∩ M.E) := by convert hI rw [inter_eq_self_of_subset_left hI.subset_ground] @[aesop unsafe 15% (rule_sets := [Matroid])] theorem IsBasis.left_subset_ground (hI : M.IsBasis I X) : I ⊆ M.E := hI.indep.subset_ground theorem IsBasis.eq_of_subset_indep (hI : M.IsBasis I X) (hJ : M.Indep J) (hIJ : I ⊆ J) (hJX : J ⊆ X) : I = J := hIJ.antisymm (hI.1.2 ⟨hJ, hJX⟩ hIJ) theorem IsBasis.Finite (hI : M.IsBasis I X) [RankFinite M] : I.Finite := hI.indep.finite theorem isBasis_iff' : M.IsBasis I X ↔ (M.Indep I ∧ I ⊆ X ∧ ∀ ⦃J⦄, M.Indep J → I ⊆ J → J ⊆ X → I = J) ∧ X ⊆ M.E := by rw [IsBasis, maximal_subset_iff] tauto theorem isBasis_iff (hX : X ⊆ M.E := by aesop_mat) : M.IsBasis I X ↔ (M.Indep I ∧ I ⊆ X ∧ ∀ J, M.Indep J → I ⊆ J → J ⊆ X → I = J) := by rw [isBasis_iff', and_iff_left hX] theorem isBasis'_iff_isBasis_inter_ground : M.IsBasis' I X ↔ M.IsBasis I (X ∩ M.E) := by rw [IsBasis', IsBasis, and_iff_left inter_subset_right, maximal_iff_maximal_of_imp_of_forall] · exact fun I hI ↦ ⟨hI.1, hI.2.trans inter_subset_left⟩ exact fun I hI ↦ ⟨I, rfl.le, hI.1, subset_inter hI.2 hI.1.subset_ground⟩ theorem isBasis'_iff_isBasis (hX : X ⊆ M.E := by aesop_mat) : M.IsBasis' I X ↔ M.IsBasis I X := by rw [isBasis'_iff_isBasis_inter_ground, inter_eq_self_of_subset_left hX] theorem isBasis_iff_isBasis'_subset_ground : M.IsBasis I X ↔ M.IsBasis' I X ∧ X ⊆ M.E := ⟨fun h ↦ ⟨h.isBasis', h.subset_ground⟩, fun h ↦ (isBasis'_iff_isBasis h.2).mp h.1⟩ theorem IsBasis'.isBasis_inter_ground (hIX : M.IsBasis' I X) : M.IsBasis I (X ∩ M.E) := isBasis'_iff_isBasis_inter_ground.mp hIX theorem IsBasis'.eq_of_subset_indep (hI : M.IsBasis' I X) (hJ : M.Indep J) (hIJ : I ⊆ J) (hJX : J ⊆ X) : I = J := hIJ.antisymm (hI.2 ⟨hJ, hJX⟩ hIJ) theorem IsBasis'.insert_not_indep (hI : M.IsBasis' I X) (he : e ∈ X \ I) : ¬ M.Indep (insert e I) := fun hi ↦ he.2 <\| insert_eq_self.1 <\| Eq.symm <\| hI.eq_of_subset_indep hi (subset_insert _ _) (insert_subset he.1 hI.subset) theorem isBasis_iff_maximal (hX : X ⊆ M.E := by aesop_mat) : M.IsBasis I X ↔ Maximal (fun I ↦ M.Indep I ∧ I ⊆ X) I := by rw [IsBasis, and_iff_left hX] theorem Indep.isBasis_of_maximal_subset (hI : M.Indep I) (hIX : I ⊆ X) (hmax : ∀ ⦃J⦄, M.Indep J → I ⊆ J → J ⊆ X → J ⊆ I) (hX : X ⊆ M.E := by aesop_mat) : M.IsBasis I X := by rw [isBasis_iff (by aesop_mat : X ⊆ M.E), and_iff_right hI, and_iff_right hIX] exact fun J hJ hIJ hJX ↦ hIJ.antisymm (hmax hJ hIJ hJX)	theorem IsBasis.isBasis_subset (hI : M.IsBasis I X) (hIY : I ⊆ Y) (hYX : Y ⊆ X) : M.IsBasis I Y := by rw [isBasis_iff (hYX.trans hI.subset_ground), and_iff_right hI.indep, and_iff_right hIY] exact fun J hJ hIJ hJY ↦ hI.eq_of_subset_indep hJ hIJ (hJY.trans hYX) @[simp] theorem isBasis_self_iff_indep : M.IsBasis I I ↔ M.Indep I := by rw [isBasis_iff', and_iff_right rfl.subset, and_assoc, and_iff_left_iff_imp] exact fun hi ↦ ⟨fun _ _ ↦ subset_antisymm, hi.subset_ground⟩	Mathlib/Data/Matroid/Basic.lean	904	912
/- Copyright (c) 2020 Anne Baanen. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Anne Baanen, Kexing Ying, Moritz Doll -/ import Mathlib.Algebra.GroupWithZero.Action.Opposite import Mathlib.LinearAlgebra.Finsupp.VectorSpace import Mathlib.LinearAlgebra.Matrix.Basis import Mathlib.LinearAlgebra.Matrix.Nondegenerate import Mathlib.LinearAlgebra.Matrix.NonsingularInverse import Mathlib.LinearAlgebra.Matrix.ToLinearEquiv import Mathlib.LinearAlgebra.SesquilinearForm import Mathlib.LinearAlgebra.Basis.Bilinear /-! # Sesquilinear form This file defines the conversion between sesquilinear maps and matrices. ## Main definitions * `Matrix.toLinearMap₂` given a basis define a bilinear map * `Matrix.toLinearMap₂'` define the bilinear map on `n → R` * `LinearMap.toMatrix₂`: calculate the matrix coefficients of a bilinear map * `LinearMap.toMatrix₂'`: calculate the matrix coefficients of a bilinear map on `n → R` ## TODO At the moment this is quite a literal port from `Matrix.BilinearForm`. Everything should be generalized to fully semibilinear forms. ## Tags Sesquilinear form, Sesquilinear map, matrix, basis -/ variable {R R₁ S₁ R₂ S₂ M₁ M₂ M₁' M₂' N₂ n m n' m' ι : Type} open Finset LinearMap Matrix open Matrix open scoped RightActions section AuxToLinearMap variable [Semiring R₁] [Semiring S₁] [Semiring R₂] [Semiring S₂] [AddCommMonoid N₂] [Module S₁ N₂] [Module S₂ N₂] [SMulCommClass S₂ S₁ N₂] variable [Fintype n] [Fintype m] variable (σ₁ : R₁ →+ S₁) (σ₂ : R₂ →+* S₂) /-- The map from `Matrix n n R` to bilinear maps on `n → R`. This is an auxiliary definition for the equivalence `Matrix.toLinearMap₂'`. -/ def Matrix.toLinearMap₂'Aux (f : Matrix n m N₂) : (n → R₁) →ₛₗ[σ₁] (m → R₂) →ₛₗ[σ₂] N₂ := -- porting note: we don't seem to have `∑ i j` as valid notation yet mk₂'ₛₗ σ₁ σ₂ (fun (v : n → R₁) (w : m → R₂) => ∑ i, ∑ j, σ₂ (w j) • σ₁ (v i) • f i j) (fun _ _ _ => by simp only [Pi.add_apply, map_add, smul_add, sum_add_distrib, add_smul]) (fun c v w => by simp only [Pi.smul_apply, smul_sum, smul_eq_mul, σ₁.map_mul, ← smul_comm _ (σ₁ c), MulAction.mul_smul]) (fun _ _ _ => by simp only [Pi.add_apply, map_add, add_smul, smul_add, sum_add_distrib]) (fun _ v w => by simp only [Pi.smul_apply, smul_eq_mul, map_mul, MulAction.mul_smul, smul_sum]) variable [DecidableEq n] [DecidableEq m] theorem Matrix.toLinearMap₂'Aux_single (f : Matrix n m N₂) (i : n) (j : m) : f.toLinearMap₂'Aux σ₁ σ₂ (Pi.single i 1) (Pi.single j 1) = f i j := by rw [Matrix.toLinearMap₂'Aux, mk₂'ₛₗ_apply] have : (∑ i', ∑ j', (if i = i' then (1 : S₁) else (0 : S₁)) • (if j = j' then (1 : S₂) else (0 : S₂)) • f i' j') = f i j := by simp_rw [← Finset.smul_sum] simp only [op_smul_eq_smul, ite_smul, one_smul, zero_smul, sum_ite_eq, mem_univ, ↓reduceIte] rw [← this] exact Finset.sum_congr rfl fun _ _ => Finset.sum_congr rfl fun _ _ => by aesop end AuxToLinearMap section AuxToMatrix section CommSemiring variable [CommSemiring R] [Semiring R₁] [Semiring S₁] [Semiring R₂] [Semiring S₂] variable [AddCommMonoid M₁] [Module R₁ M₁] [AddCommMonoid M₂] [Module R₂ M₂] [AddCommMonoid N₂] [Module R N₂] [Module S₁ N₂] [Module S₂ N₂] [SMulCommClass S₁ R N₂] [SMulCommClass S₂ R N₂] [SMulCommClass S₂ S₁ N₂] variable {σ₁ : R₁ →+* S₁} {σ₂ : R₂ →+* S₂} variable (R) /-- The linear map from sesquilinear maps to `Matrix n m N₂` given an `n`-indexed basis for `M₁` and an `m`-indexed basis for `M₂`. This is an auxiliary definition for the equivalence `Matrix.toLinearMapₛₗ₂'`. -/ def LinearMap.toMatrix₂Aux (b₁ : n → M₁) (b₂ : m → M₂) : (M₁ →ₛₗ[σ₁] M₂ →ₛₗ[σ₂] N₂) →ₗ[R] Matrix n m N₂ where toFun f := of fun i j => f (b₁ i) (b₂ j) map_add' _f _g := rfl map_smul' _f _g := rfl @[simp] theorem LinearMap.toMatrix₂Aux_apply (f : M₁ →ₛₗ[σ₁] M₂ →ₛₗ[σ₂] N₂) (b₁ : n → M₁) (b₂ : m → M₂) (i : n) (j : m) : LinearMap.toMatrix₂Aux R b₁ b₂ f i j = f (b₁ i) (b₂ j) := rfl variable [Fintype n] [Fintype m] variable [DecidableEq n] [DecidableEq m] theorem LinearMap.toLinearMap₂'Aux_toMatrix₂Aux (f : (n → R₁) →ₛₗ[σ₁] (m → R₂) →ₛₗ[σ₂] N₂) : Matrix.toLinearMap₂'Aux σ₁ σ₂ (LinearMap.toMatrix₂Aux R (fun i => Pi.single i 1) (fun j => Pi.single j 1) f) = f := by refine ext_basis (Pi.basisFun R₁ n) (Pi.basisFun R₂ m) fun i j => ?_ simp_rw [Pi.basisFun_apply, Matrix.toLinearMap₂'Aux_single, LinearMap.toMatrix₂Aux_apply] theorem Matrix.toMatrix₂Aux_toLinearMap₂'Aux (f : Matrix n m N₂) : LinearMap.toMatrix₂Aux R (fun i => Pi.single i 1) (fun j => Pi.single j 1) (f.toLinearMap₂'Aux σ₁ σ₂) = f := by ext i j simp_rw [LinearMap.toMatrix₂Aux_apply, Matrix.toLinearMap₂'Aux_single] end CommSemiring end AuxToMatrix section ToMatrix' /-! ### Bilinear maps over `n → R` This section deals with the conversion between matrices and sesquilinear maps on `n → R`. -/ variable [CommSemiring R] [AddCommMonoid N₂] [Module R N₂] [Semiring R₁] [Semiring R₂] [Semiring S₁] [Semiring S₂] [Module S₁ N₂] [Module S₂ N₂] [SMulCommClass S₁ R N₂] [SMulCommClass S₂ R N₂] [SMulCommClass S₂ S₁ N₂] variable {σ₁ : R₁ →+* S₁} {σ₂ : R₂ →+* S₂} variable [Fintype n] [Fintype m] variable [DecidableEq n] [DecidableEq m] variable (R) /-- The linear equivalence between sesquilinear maps and `n × m` matrices -/ def LinearMap.toMatrixₛₗ₂' : ((n → R₁) →ₛₗ[σ₁] (m → R₂) →ₛₗ[σ₂] N₂) ≃ₗ[R] Matrix n m N₂ := { LinearMap.toMatrix₂Aux R (fun i => Pi.single i 1) (fun j => Pi.single j 1) with toFun := LinearMap.toMatrix₂Aux R _ _ invFun := Matrix.toLinearMap₂'Aux σ₁ σ₂ left_inv := LinearMap.toLinearMap₂'Aux_toMatrix₂Aux R right_inv := Matrix.toMatrix₂Aux_toLinearMap₂'Aux R } /-- The linear equivalence between bilinear maps and `n × m` matrices -/ def LinearMap.toMatrix₂' : ((n → S₁) →ₗ[S₁] (m → S₂) →ₗ[S₂] N₂) ≃ₗ[R] Matrix n m N₂ := LinearMap.toMatrixₛₗ₂' R variable (σ₁ σ₂) /-- The linear equivalence between `n × n` matrices and sesquilinear maps on `n → R` -/ def Matrix.toLinearMapₛₗ₂' : Matrix n m N₂ ≃ₗ[R] (n → R₁) →ₛₗ[σ₁] (m → R₂) →ₛₗ[σ₂] N₂ := (LinearMap.toMatrixₛₗ₂' R).symm /-- The linear equivalence between `n × n` matrices and bilinear maps on `n → R` -/ def Matrix.toLinearMap₂' : Matrix n m N₂ ≃ₗ[R] (n → S₁) →ₗ[S₁] (m → S₂) →ₗ[S₂] N₂ := (LinearMap.toMatrix₂' R).symm variable {R} theorem Matrix.toLinearMapₛₗ₂'_aux_eq (M : Matrix n m N₂) : Matrix.toLinearMap₂'Aux σ₁ σ₂ M = Matrix.toLinearMapₛₗ₂' R σ₁ σ₂ M := rfl theorem Matrix.toLinearMapₛₗ₂'_apply (M : Matrix n m N₂) (x : n → R₁) (y : m → R₂) : -- porting note: we don't seem to have `∑ i j` as valid notation yet Matrix.toLinearMapₛₗ₂' R σ₁ σ₂ M x y = ∑ i, ∑ j, σ₁ (x i) • σ₂ (y j) • M i j := by rw [toLinearMapₛₗ₂', toMatrixₛₗ₂', LinearEquiv.coe_symm_mk, toLinearMap₂'Aux, mk₂'ₛₗ_apply] apply Finset.sum_congr rfl fun _ _ => Finset.sum_congr rfl fun _ _ => by rw [smul_comm] theorem Matrix.toLinearMap₂'_apply (M : Matrix n m N₂) (x : n → S₁) (y : m → S₂) : -- porting note: we don't seem to have `∑ i j` as valid notation yet Matrix.toLinearMap₂' R M x y = ∑ i, ∑ j, x i • y j • M i j := Finset.sum_congr rfl fun _ _ => Finset.sum_congr rfl fun _ _ => by rw [RingHom.id_apply, RingHom.id_apply, smul_comm] theorem Matrix.toLinearMap₂'_apply' {T : Type} [CommSemiring T] (M : Matrix n m T) (v : n → T) (w : m → T) : Matrix.toLinearMap₂' T M v w = dotProduct v (M ᵥ w) := by simp_rw [Matrix.toLinearMap₂'_apply, dotProduct, Matrix.mulVec, dotProduct] refine Finset.sum_congr rfl fun _ _ => ?_ rw [Finset.mul_sum] refine Finset.sum_congr rfl fun _ _ => ?_ rw [smul_eq_mul, smul_eq_mul, mul_comm (w _), ← mul_assoc] @[simp] theorem Matrix.toLinearMapₛₗ₂'_single (M : Matrix n m N₂) (i : n) (j : m) : Matrix.toLinearMapₛₗ₂' R σ₁ σ₂ M (Pi.single i 1) (Pi.single j 1) = M i j := Matrix.toLinearMap₂'Aux_single σ₁ σ₂ M i j @[simp] theorem Matrix.toLinearMap₂'_single (M : Matrix n m N₂) (i : n) (j : m) : Matrix.toLinearMap₂' R M (Pi.single i 1) (Pi.single j 1) = M i j := Matrix.toLinearMap₂'Aux_single _ _ M i j @[simp] theorem LinearMap.toMatrixₛₗ₂'_symm : ((LinearMap.toMatrixₛₗ₂' R).symm : Matrix n m N₂ ≃ₗ[R] _) = Matrix.toLinearMapₛₗ₂' R σ₁ σ₂ := rfl @[simp] theorem Matrix.toLinearMapₛₗ₂'_symm : ((Matrix.toLinearMapₛₗ₂' R σ₁ σ₂).symm : _ ≃ₗ[R] Matrix n m N₂) = LinearMap.toMatrixₛₗ₂' R := (LinearMap.toMatrixₛₗ₂' R).symm_symm @[simp] theorem Matrix.toLinearMapₛₗ₂'_toMatrix' (B : (n → R₁) →ₛₗ[σ₁] (m → R₂) →ₛₗ[σ₂] N₂) : Matrix.toLinearMapₛₗ₂' R σ₁ σ₂ (LinearMap.toMatrixₛₗ₂' R B) = B := (Matrix.toLinearMapₛₗ₂' R σ₁ σ₂).apply_symm_apply B @[simp] theorem Matrix.toLinearMap₂'_toMatrix' (B : (n → S₁) →ₗ[S₁] (m → S₂) →ₗ[S₂] N₂) : Matrix.toLinearMap₂' R (LinearMap.toMatrix₂' R B) = B := (Matrix.toLinearMap₂' R).apply_symm_apply B @[simp] theorem LinearMap.toMatrix'_toLinearMapₛₗ₂' (M : Matrix n m N₂) : LinearMap.toMatrixₛₗ₂' R (Matrix.toLinearMapₛₗ₂' R σ₁ σ₂ M) = M := (LinearMap.toMatrixₛₗ₂' R).apply_symm_apply M @[simp] theorem LinearMap.toMatrix'_toLinearMap₂' (M : Matrix n m N₂) : LinearMap.toMatrix₂' R (Matrix.toLinearMap₂' R (S₁ := S₁) (S₂ := S₂) M) = M := (LinearMap.toMatrixₛₗ₂' R).apply_symm_apply M @[simp] theorem LinearMap.toMatrixₛₗ₂'_apply (B : (n → R₁) →ₛₗ[σ₁] (m → R₂) →ₛₗ[σ₂] N₂) (i : n) (j : m) : LinearMap.toMatrixₛₗ₂' R B i j = B (Pi.single i 1) (Pi.single j 1) := rfl @[simp] theorem LinearMap.toMatrix₂'_apply (B : (n → S₁) →ₗ[S₁] (m → S₂) →ₗ[S₂] N₂) (i : n) (j : m) : LinearMap.toMatrix₂' R B i j = B (Pi.single i 1) (Pi.single j 1) := rfl end ToMatrix' section CommToMatrix' -- TODO: Introduce matrix multiplication by matrices of scalars variable {R : Type} [CommSemiring R] variable [Fintype n] [Fintype m] variable [DecidableEq n] [DecidableEq m] variable [Fintype n'] [Fintype m'] variable [DecidableEq n'] [DecidableEq m'] @[simp] theorem LinearMap.toMatrix₂'_compl₁₂ (B : (n → R) →ₗ[R] (m → R) →ₗ[R] R) (l : (n' → R) →ₗ[R] n → R) (r : (m' → R) →ₗ[R] m → R) : toMatrix₂' R (B.compl₁₂ l r) = (toMatrix' l)ᵀ toMatrix₂' R B * toMatrix' r := by ext i j simp only [LinearMap.toMatrix₂'_apply, LinearMap.compl₁₂_apply, transpose_apply, Matrix.mul_apply, LinearMap.toMatrix', LinearEquiv.coe_mk, sum_mul] rw [sum_comm] conv_lhs => rw [← LinearMap.sum_repr_mul_repr_mul (Pi.basisFun R n) (Pi.basisFun R m) (l _) (r _)] rw [Finsupp.sum_fintype] · apply sum_congr rfl rintro i' - rw [Finsupp.sum_fintype] · apply sum_congr rfl rintro j' - simp only [smul_eq_mul, Pi.basisFun_repr, mul_assoc, mul_comm, mul_left_comm, Pi.basisFun_apply, of_apply] · intros simp only [zero_smul, smul_zero] · intros simp only [zero_smul, Finsupp.sum_zero] theorem LinearMap.toMatrix₂'_comp (B : (n → R) →ₗ[R] (m → R) →ₗ[R] R) (f : (n' → R) →ₗ[R] n → R) : toMatrix₂' R (B.comp f) = (toMatrix' f)ᵀ * toMatrix₂' R B := by rw [← LinearMap.compl₂_id (B.comp f), ← LinearMap.compl₁₂] simp theorem LinearMap.toMatrix₂'_compl₂ (B : (n → R) →ₗ[R] (m → R) →ₗ[R] R) (f : (m' → R) →ₗ[R] m → R) : toMatrix₂' R (B.compl₂ f) = toMatrix₂' R B * toMatrix' f := by rw [← LinearMap.comp_id B, ← LinearMap.compl₁₂] simp theorem LinearMap.mul_toMatrix₂'_mul (B : (n → R) →ₗ[R] (m → R) →ₗ[R] R) (M : Matrix n' n R) (N : Matrix m m' R) : M * toMatrix₂' R B * N = toMatrix₂' R (B.compl₁₂ (toLin' Mᵀ) (toLin' N)) := by simp theorem LinearMap.mul_toMatrix' (B : (n → R) →ₗ[R] (m → R) →ₗ[R] R) (M : Matrix n' n R) : M * toMatrix₂' R B = toMatrix₂' R (B.comp <\| toLin' Mᵀ) := by simp only [B.toMatrix₂'_comp, transpose_transpose, toMatrix'_toLin'] theorem LinearMap.toMatrix₂'_mul (B : (n → R) →ₗ[R] (m → R) →ₗ[R] R) (M : Matrix m m' R) : toMatrix₂' R B * M = toMatrix₂' R (B.compl₂ <\| toLin' M) := by simp only [B.toMatrix₂'_compl₂, toMatrix'_toLin'] theorem Matrix.toLinearMap₂'_comp (M : Matrix n m R) (P : Matrix n n' R) (Q : Matrix m m' R) : LinearMap.compl₁₂ (Matrix.toLinearMap₂' R M) (toLin' P) (toLin' Q) = toLinearMap₂' R (Pᵀ * M * Q) := (LinearMap.toMatrix₂' R).injective (by simp) end CommToMatrix' section ToMatrix /-! ### Bilinear maps over arbitrary vector spaces This section deals with the conversion between matrices and bilinear maps on a module with a fixed basis. -/ variable [CommSemiring R] variable [AddCommMonoid M₁] [Module R M₁] [AddCommMonoid M₂] [Module R M₂] [AddCommMonoid N₂] [Module R N₂] variable [DecidableEq n] [Fintype n] variable [DecidableEq m] [Fintype m] section variable (b₁ : Basis n R M₁) (b₂ : Basis m R M₂) /-- `LinearMap.toMatrix₂ b₁ b₂` is the equivalence between `R`-bilinear maps on `M` and `n`-by-`m` matrices with entries in `R`, if `b₁` and `b₂` are `R`-bases for `M₁` and `M₂`, respectively. -/ noncomputable def LinearMap.toMatrix₂ : (M₁ →ₗ[R] M₂ →ₗ[R] N₂) ≃ₗ[R] Matrix n m N₂ := (b₁.equivFun.arrowCongr (b₂.equivFun.arrowCongr (LinearEquiv.refl R N₂))).trans (LinearMap.toMatrix₂' R) /-- `Matrix.toLinearMap₂ b₁ b₂` is the equivalence between `R`-bilinear maps on `M` and `n`-by-`m` matrices with entries in `R`, if `b₁` and `b₂` are `R`-bases for `M₁` and `M₂`, respectively; this is the reverse direction of `LinearMap.toMatrix₂ b₁ b₂`. -/ noncomputable def Matrix.toLinearMap₂ : Matrix n m N₂ ≃ₗ[R] M₁ →ₗ[R] M₂ →ₗ[R] N₂ := (LinearMap.toMatrix₂ b₁ b₂).symm -- We make this and not `LinearMap.toMatrix₂` a `simp` lemma to avoid timeouts @[simp] theorem LinearMap.toMatrix₂_apply (B : M₁ →ₗ[R] M₂ →ₗ[R] N₂) (i : n) (j : m) : LinearMap.toMatrix₂ b₁ b₂ B i j = B (b₁ i) (b₂ j) := by simp only [toMatrix₂, LinearEquiv.trans_apply, toMatrix₂'_apply, LinearEquiv.arrowCongr_apply, Basis.equivFun_symm_apply, Pi.single_apply, ite_smul, one_smul, zero_smul, sum_ite_eq', mem_univ, ↓reduceIte, LinearEquiv.refl_apply] @[simp] theorem Matrix.toLinearMap₂_apply (M : Matrix n m N₂) (x : M₁) (y : M₂) : Matrix.toLinearMap₂ b₁ b₂ M x y = ∑ i, ∑ j, b₁.repr x i • b₂.repr y j • M i j := Finset.sum_congr rfl fun _ _ => Finset.sum_congr rfl fun _ _ => smul_algebra_smul_comm ((RingHom.id R) ((Basis.equivFun b₁) x _)) ((RingHom.id R) ((Basis.equivFun b₂) y _)) (M _ _) -- Not a `simp` lemma since `LinearMap.toMatrix₂` needs an extra argument theorem LinearMap.toMatrix₂Aux_eq (B : M₁ →ₗ[R] M₂ →ₗ[R] N₂) : LinearMap.toMatrix₂Aux R b₁ b₂ B = LinearMap.toMatrix₂ b₁ b₂ B := Matrix.ext fun i j => by rw [LinearMap.toMatrix₂_apply, LinearMap.toMatrix₂Aux_apply] @[simp] theorem LinearMap.toMatrix₂_symm : (LinearMap.toMatrix₂ b₁ b₂).symm = Matrix.toLinearMap₂ (N₂ := N₂) b₁ b₂ := rfl @[simp] theorem Matrix.toLinearMap₂_symm : (Matrix.toLinearMap₂ b₁ b₂).symm = LinearMap.toMatrix₂ (N₂ := N₂) b₁ b₂ := (LinearMap.toMatrix₂ b₁ b₂).symm_symm theorem Matrix.toLinearMap₂_basisFun : Matrix.toLinearMap₂ (Pi.basisFun R n) (Pi.basisFun R m) = Matrix.toLinearMap₂' R (N₂ := N₂) := by ext M simp only [coe_comp, coe_single, Function.comp_apply, toLinearMap₂_apply, Pi.basisFun_repr, toLinearMap₂'_apply] theorem LinearMap.toMatrix₂_basisFun : LinearMap.toMatrix₂ (Pi.basisFun R n) (Pi.basisFun R m) = LinearMap.toMatrix₂' R (N₂ := N₂) := by ext B rw [LinearMap.toMatrix₂_apply, LinearMap.toMatrix₂'_apply, Pi.basisFun_apply, Pi.basisFun_apply] @[simp] theorem Matrix.toLinearMap₂_toMatrix₂ (B : M₁ →ₗ[R] M₂ →ₗ[R] N₂) : Matrix.toLinearMap₂ b₁ b₂ (LinearMap.toMatrix₂ b₁ b₂ B) = B := (Matrix.toLinearMap₂ b₁ b₂).apply_symm_apply B @[simp] theorem LinearMap.toMatrix₂_toLinearMap₂ (M : Matrix n m N₂) : LinearMap.toMatrix₂ b₁ b₂ (Matrix.toLinearMap₂ b₁ b₂ M) = M := (LinearMap.toMatrix₂ b₁ b₂).apply_symm_apply M variable (b₁ : Basis n R M₁) (b₂ : Basis m R M₂) variable [AddCommMonoid M₁'] [Module R M₁'] variable [AddCommMonoid M₂'] [Module R M₂'] variable (b₁' : Basis n' R M₁') variable (b₂' : Basis m' R M₂') variable [Fintype n'] [Fintype m'] variable [DecidableEq n'] [DecidableEq m'] -- Cannot be a `simp` lemma because `b₁` and `b₂` must be inferred. theorem LinearMap.toMatrix₂_compl₁₂ (B : M₁ →ₗ[R] M₂ →ₗ[R] R) (l : M₁' →ₗ[R] M₁) (r : M₂' →ₗ[R] M₂) : LinearMap.toMatrix₂ b₁' b₂' (B.compl₁₂ l r) = (toMatrix b₁' b₁ l)ᵀ * LinearMap.toMatrix₂ b₁ b₂ B * toMatrix b₂' b₂ r := by ext i j simp only [LinearMap.toMatrix₂_apply, compl₁₂_apply, transpose_apply, Matrix.mul_apply, LinearMap.toMatrix_apply, LinearEquiv.coe_mk, sum_mul] rw [sum_comm] conv_lhs => rw [← LinearMap.sum_repr_mul_repr_mul b₁ b₂] rw [Finsupp.sum_fintype] · apply sum_congr rfl rintro i' - rw [Finsupp.sum_fintype] · apply sum_congr rfl rintro j' - simp only [smul_eq_mul, LinearMap.toMatrix_apply, Basis.equivFun_apply, mul_assoc, mul_comm, mul_left_comm] · intros simp only [zero_smul, smul_zero] · intros simp only [zero_smul, Finsupp.sum_zero] theorem LinearMap.toMatrix₂_comp (B : M₁ →ₗ[R] M₂ →ₗ[R] R) (f : M₁' →ₗ[R] M₁) : LinearMap.toMatrix₂ b₁' b₂ (B.comp f) = (toMatrix b₁' b₁ f)ᵀ * LinearMap.toMatrix₂ b₁ b₂ B := by rw [← LinearMap.compl₂_id (B.comp f), ← LinearMap.compl₁₂, LinearMap.toMatrix₂_compl₁₂ b₁ b₂] simp theorem LinearMap.toMatrix₂_compl₂ (B : M₁ →ₗ[R] M₂ →ₗ[R] R) (f : M₂' →ₗ[R] M₂) : LinearMap.toMatrix₂ b₁ b₂' (B.compl₂ f) = LinearMap.toMatrix₂ b₁ b₂ B * toMatrix b₂' b₂ f := by rw [← LinearMap.comp_id B, ← LinearMap.compl₁₂, LinearMap.toMatrix₂_compl₁₂ b₁ b₂] simp @[simp] theorem LinearMap.toMatrix₂_mul_basis_toMatrix (c₁ : Basis n' R M₁) (c₂ : Basis m' R M₂) (B : M₁ →ₗ[R] M₂ →ₗ[R] R) : (b₁.toMatrix c₁)ᵀ * LinearMap.toMatrix₂ b₁ b₂ B * b₂.toMatrix c₂ = LinearMap.toMatrix₂ c₁ c₂ B := by simp_rw [← LinearMap.toMatrix_id_eq_basis_toMatrix] rw [← LinearMap.toMatrix₂_compl₁₂, LinearMap.compl₁₂_id_id] theorem LinearMap.mul_toMatrix₂_mul (B : M₁ →ₗ[R] M₂ →ₗ[R] R) (M : Matrix n' n R) (N : Matrix m m' R) : M * LinearMap.toMatrix₂ b₁ b₂ B * N = LinearMap.toMatrix₂ b₁' b₂' (B.compl₁₂ (toLin b₁' b₁ Mᵀ) (toLin b₂' b₂ N)) := by simp_rw [LinearMap.toMatrix₂_compl₁₂ b₁ b₂, toMatrix_toLin, transpose_transpose] theorem LinearMap.mul_toMatrix₂ (B : M₁ →ₗ[R] M₂ →ₗ[R] R) (M : Matrix n' n R) : M * LinearMap.toMatrix₂ b₁ b₂ B = LinearMap.toMatrix₂ b₁' b₂ (B.comp (toLin b₁' b₁ Mᵀ)) := by rw [LinearMap.toMatrix₂_comp b₁, toMatrix_toLin, transpose_transpose] theorem LinearMap.toMatrix₂_mul (B : M₁ →ₗ[R] M₂ →ₗ[R] R) (M : Matrix m m' R) : LinearMap.toMatrix₂ b₁ b₂ B * M = LinearMap.toMatrix₂ b₁ b₂' (B.compl₂ (toLin b₂' b₂ M)) := by rw [LinearMap.toMatrix₂_compl₂ b₁ b₂, toMatrix_toLin] theorem Matrix.toLinearMap₂_compl₁₂ (M : Matrix n m R) (P : Matrix n n' R) (Q : Matrix m m' R) : (Matrix.toLinearMap₂ b₁ b₂ M).compl₁₂ (toLin b₁' b₁ P) (toLin b₂' b₂ Q) = Matrix.toLinearMap₂ b₁' b₂' (Pᵀ * M * Q) := (LinearMap.toMatrix₂ b₁' b₂').injective (by simp only [LinearMap.toMatrix₂_compl₁₂ b₁ b₂, LinearMap.toMatrix₂_toLinearMap₂, toMatrix_toLin]) end end ToMatrix /-! ### Adjoint pairs -/ section MatrixAdjoints open Matrix variable [CommRing R] variable [AddCommMonoid M₁] [Module R M₁] [AddCommMonoid M₂] [Module R M₂] variable [Fintype n] [Fintype n'] variable (b₁ : Basis n R M₁) (b₂ : Basis n' R M₂) variable (J J₂ : Matrix n n R) (J' : Matrix n' n' R) variable (A : Matrix n' n R) (A' : Matrix n n' R) variable (A₁ A₂ : Matrix n n R) /-- The condition for the matrices `A`, `A'` to be an adjoint pair with respect to the square matrices `J`, `J₃`. -/ def Matrix.IsAdjointPair := Aᵀ * J' = J * A' /-- The condition for a square matrix `A` to be self-adjoint with respect to the square matrix `J`. -/ def Matrix.IsSelfAdjoint := Matrix.IsAdjointPair J J A₁ A₁ /-- The condition for a square matrix `A` to be skew-adjoint with respect to the square matrix `J`. -/ def Matrix.IsSkewAdjoint := Matrix.IsAdjointPair J J A₁ (-A₁) variable [DecidableEq n] [DecidableEq n'] @[simp] theorem isAdjointPair_toLinearMap₂' : LinearMap.IsAdjointPair (Matrix.toLinearMap₂' R J) (Matrix.toLinearMap₂' R J') (Matrix.toLin' A) (Matrix.toLin' A') ↔ Matrix.IsAdjointPair J J' A A' := by rw [isAdjointPair_iff_comp_eq_compl₂] have h : ∀ B B' : (n → R) →ₗ[R] (n' → R) →ₗ[R] R, B = B' ↔ LinearMap.toMatrix₂' R B = LinearMap.toMatrix₂' R B' := by intro B B' constructor <;> intro h · rw [h] · exact (LinearMap.toMatrix₂' R).injective h simp_rw [h, LinearMap.toMatrix₂'_comp, LinearMap.toMatrix₂'_compl₂, LinearMap.toMatrix'_toLin', LinearMap.toMatrix'_toLinearMap₂'] rfl @[simp] theorem isAdjointPair_toLinearMap₂ : LinearMap.IsAdjointPair (Matrix.toLinearMap₂ b₁ b₁ J) (Matrix.toLinearMap₂ b₂ b₂ J') (Matrix.toLin b₁ b₂ A) (Matrix.toLin b₂ b₁ A') ↔ Matrix.IsAdjointPair J J' A A' := by rw [isAdjointPair_iff_comp_eq_compl₂] have h : ∀ B B' : M₁ →ₗ[R] M₂ →ₗ[R] R, B = B' ↔ LinearMap.toMatrix₂ b₁ b₂ B = LinearMap.toMatrix₂ b₁ b₂ B' := by intro B B' constructor <;> intro h · rw [h] · exact (LinearMap.toMatrix₂ b₁ b₂).injective h simp_rw [h, LinearMap.toMatrix₂_comp b₂ b₂, LinearMap.toMatrix₂_compl₂ b₁ b₁, LinearMap.toMatrix_toLin, LinearMap.toMatrix₂_toLinearMap₂] rfl theorem Matrix.isAdjointPair_equiv (P : Matrix n n R) (h : IsUnit P) : (Pᵀ * J * P).IsAdjointPair (Pᵀ * J * P) A₁ A₂ ↔ J.IsAdjointPair J (P * A₁ * P⁻¹) (P * A₂ * P⁻¹) := by have h' : IsUnit P.det := P.isUnit_iff_isUnit_det.mp h let u := P.nonsingInvUnit h' let v := Pᵀ.nonsingInvUnit (P.isUnit_det_transpose h') let x := A₁ᵀ * Pᵀ * J let y := J * P * A₂ suffices x * u = v * y ↔ v⁻¹ * x = y * u⁻¹ by dsimp only [Matrix.IsAdjointPair] simp only [Matrix.transpose_mul] simp only [← mul_assoc, P.transpose_nonsing_inv] convert this using 2 · rw [mul_assoc, mul_assoc, ← mul_assoc J] rfl · rw [mul_assoc, mul_assoc, ← mul_assoc _ _ J] rfl rw [Units.eq_mul_inv_iff_mul_eq] conv_rhs => rw [mul_assoc] rw [v.inv_mul_eq_iff_eq_mul] /-- The submodule of pair-self-adjoint matrices with respect to bilinear forms corresponding to given matrices `J`, `J₂`. -/ def pairSelfAdjointMatricesSubmodule : Submodule R (Matrix n n R) := (isPairSelfAdjointSubmodule (Matrix.toLinearMap₂' R J) (Matrix.toLinearMap₂' R J₂)).map ((LinearMap.toMatrix' : ((n → R) →ₗ[R] n → R) ≃ₗ[R] Matrix n n R) : ((n → R) →ₗ[R] n → R) →ₗ[R] Matrix n n R) @[simp] theorem mem_pairSelfAdjointMatricesSubmodule : A₁ ∈ pairSelfAdjointMatricesSubmodule J J₂ ↔ Matrix.IsAdjointPair J J₂ A₁ A₁ := by simp only [pairSelfAdjointMatricesSubmodule, LinearEquiv.coe_coe, LinearMap.toMatrix'_apply, Submodule.mem_map, mem_isPairSelfAdjointSubmodule] constructor · rintro ⟨f, hf, hA⟩ have hf' : f = toLin' A₁ := by rw [← hA, Matrix.toLin'_toMatrix'] rw [hf'] at hf rw [← isAdjointPair_toLinearMap₂'] exact hf · intro h refine ⟨toLin' A₁, ?_, LinearMap.toMatrix'_toLin' _⟩ exact (isAdjointPair_toLinearMap₂' _ _ _ _).mpr h /-- The submodule of self-adjoint matrices with respect to the bilinear form corresponding to the matrix `J`. -/ def selfAdjointMatricesSubmodule : Submodule R (Matrix n n R) := pairSelfAdjointMatricesSubmodule J J @[simp] theorem mem_selfAdjointMatricesSubmodule : A₁ ∈ selfAdjointMatricesSubmodule J ↔ J.IsSelfAdjoint A₁ := by erw [mem_pairSelfAdjointMatricesSubmodule] rfl /-- The submodule of skew-adjoint matrices with respect to the bilinear form corresponding to the matrix `J`. -/ def skewAdjointMatricesSubmodule : Submodule R (Matrix n n R) := pairSelfAdjointMatricesSubmodule (-J) J @[simp] theorem mem_skewAdjointMatricesSubmodule : A₁ ∈ skewAdjointMatricesSubmodule J ↔ J.IsSkewAdjoint A₁ := by erw [mem_pairSelfAdjointMatricesSubmodule] simp [Matrix.IsSkewAdjoint, Matrix.IsAdjointPair] end MatrixAdjoints namespace LinearMap /-! ### Nondegenerate bilinear forms -/ section Det open Matrix variable [CommRing R₁] [AddCommMonoid M₁] [Module R₁ M₁] variable [DecidableEq ι] [Fintype ι]	theorem _root_.Matrix.separatingLeft_toLinearMap₂'_iff_separatingLeft_toLinearMap₂ {M : Matrix ι ι R₁} (b : Basis ι R₁ M₁) : (Matrix.toLinearMap₂' R₁ M).SeparatingLeft (R := R₁) ↔	Mathlib/LinearAlgebra/Matrix/SesquilinearForm.lean	618	621
/- Copyright (c) 2022 Praneeth Kolichala. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Praneeth Kolichala -/ import Mathlib.Data.Nat.Basic import Mathlib.Data.Nat.BinaryRec import Mathlib.Data.List.Defs import Mathlib.Tactic.Convert import Mathlib.Tactic.GeneralizeProofs import Mathlib.Tactic.Says /-! # Additional properties of binary recursion on `Nat` This file documents additional properties of binary recursion, which allows us to more easily work with operations which do depend on the number of leading zeros in the binary representation of `n`. For example, we can more easily work with `Nat.bits` and `Nat.size`. See also: `Nat.bitwise`, `Nat.pow` (for various lemmas about `size` and `shiftLeft`/`shiftRight`), and `Nat.digits`. -/ assert_not_exists Monoid -- Once we're in the `Nat` namespace, `xor` will inconveniently resolve to `Nat.xor`. /-- `bxor` denotes the `xor` function i.e. the exclusive-or function on type `Bool`. -/ local notation "bxor" => xor namespace Nat universe u variable {m n : ℕ} /-- `boddDiv2 n` returns a 2-tuple of type `(Bool, Nat)` where the `Bool` value indicates whether `n` is odd or not and the `Nat` value returns `⌊n/2⌋` -/ def boddDiv2 : ℕ → Bool × ℕ \| 0 => (false, 0) \| succ n => match boddDiv2 n with \| (false, m) => (true, m) \| (true, m) => (false, succ m) /-- `div2 n = ⌊n/2⌋` the greatest integer smaller than `n/2` -/ def div2 (n : ℕ) : ℕ := (boddDiv2 n).2 /-- `bodd n` returns `true` if `n` is odd -/ def bodd (n : ℕ) : Bool := (boddDiv2 n).1 @[simp] lemma bodd_zero : bodd 0 = false := rfl @[simp] lemma bodd_one : bodd 1 = true := rfl lemma bodd_two : bodd 2 = false := rfl @[simp] lemma bodd_succ (n : ℕ) : bodd (succ n) = not (bodd n) := by simp only [bodd, boddDiv2] let ⟨b,m⟩ := boddDiv2 n cases b <;> rfl @[simp] lemma bodd_add (m n : ℕ) : bodd (m + n) = bxor (bodd m) (bodd n) := by induction n case zero => simp case succ n ih => simp [← Nat.add_assoc, Bool.xor_not, ih] @[simp] lemma bodd_mul (m n : ℕ) : bodd (m * n) = (bodd m && bodd n) := by induction n with \| zero => simp \| succ n IH => simp only [mul_succ, bodd_add, IH, bodd_succ] cases bodd m <;> cases bodd n <;> rfl lemma mod_two_of_bodd (n : ℕ) : n % 2 = (bodd n).toNat := by have := congr_arg bodd (mod_add_div n 2) simp? [not] at this says simp only [bodd_add, bodd_mul, bodd_succ, not, bodd_zero, Bool.false_and, Bool.bne_false] at this have _ : ∀ b, and false b = false := by intro b cases b <;> rfl have _ : ∀ b, bxor b false = b := by intro b cases b <;> rfl rw [← this] rcases mod_two_eq_zero_or_one n with h \| h <;> rw [h] <;> rfl @[simp] lemma div2_zero : div2 0 = 0 := rfl @[simp] lemma div2_one : div2 1 = 0 := rfl lemma div2_two : div2 2 = 1 := rfl @[simp] lemma div2_succ (n : ℕ) : div2 (n + 1) = cond (bodd n) (succ (div2 n)) (div2 n) := by simp only [bodd, boddDiv2, div2] rcases boddDiv2 n with ⟨_\|_, _⟩ <;> simp attribute [local simp] Nat.add_comm Nat.add_assoc Nat.add_left_comm Nat.mul_comm Nat.mul_assoc lemma bodd_add_div2 : ∀ n, (bodd n).toNat + 2 * div2 n = n \| 0 => rfl \| succ n => by simp only [bodd_succ, Bool.cond_not, div2_succ, Nat.mul_comm] refine Eq.trans ?_ (congr_arg succ (bodd_add_div2 n)) cases bodd n · simp · simp; omega lemma div2_val (n) : div2 n = n / 2 := by refine Nat.eq_of_mul_eq_mul_left (by decide) (Nat.add_left_cancel (Eq.trans ?_ (Nat.mod_add_div n 2).symm)) rw [mod_two_of_bodd, bodd_add_div2] lemma bit_decomp (n : Nat) : bit (bodd n) (div2 n) = n := (bit_val _ _).trans <\| (Nat.add_comm _ _).trans <\| bodd_add_div2 _ lemma bit_zero : bit false 0 = 0 := rfl /-- `shiftLeft' b m n` performs a left shift of `m` `n` times and adds the bit `b` as the least significant bit each time. Returns the corresponding natural number -/ def shiftLeft' (b : Bool) (m : ℕ) : ℕ → ℕ \| 0 => m \| n + 1 => bit b (shiftLeft' b m n) @[simp] lemma shiftLeft'_false : ∀ n, shiftLeft' false m n = m <<< n \| 0 => rfl \| n + 1 => by have : 2 * (m * 2^n) = 2^(n+1)m := by rw [Nat.mul_comm, Nat.mul_assoc, ← Nat.pow_succ]; simp simp [shiftLeft_eq, shiftLeft', bit_val, shiftLeft'_false, this] /-- Lean takes the unprimed name for `Nat.shiftLeft_eq m n : m <<< n = m 2 ^ n`. -/ @[simp] lemma shiftLeft_eq' (m n : Nat) : shiftLeft m n = m <<< n := rfl @[simp] lemma shiftRight_eq (m n : Nat) : shiftRight m n = m >>> n := rfl lemma binaryRec_decreasing (h : n ≠ 0) : div2 n < n := by rw [div2_val] apply (div_lt_iff_lt_mul <\| succ_pos 1).2 have := Nat.mul_lt_mul_of_pos_left (lt_succ_self 1) (lt_of_le_of_ne n.zero_le h.symm) rwa [Nat.mul_one] at this /-- `size n` : Returns the size of a natural number in bits i.e. the length of its binary representation -/ def size : ℕ → ℕ := binaryRec 0 fun _ _ => succ /-- `bits n` returns a list of Bools which correspond to the binary representation of n, where the head of the list represents the least significant bit -/ def bits : ℕ → List Bool := binaryRec [] fun b _ IH => b :: IH /-- `ldiff a b` performs bitwise set difference. For each corresponding pair of bits taken as booleans, say `aᵢ` and `bᵢ`, it applies the boolean operation `aᵢ ∧ ¬bᵢ` to obtain the `iᵗʰ` bit of the result. -/ def ldiff : ℕ → ℕ → ℕ := bitwise fun a b => a && not b /-! bitwise ops -/ lemma bodd_bit (b n) : bodd (bit b n) = b := by rw [bit_val] simp only [Nat.mul_comm, Nat.add_comm, bodd_add, bodd_mul, bodd_succ, bodd_zero, Bool.not_false, Bool.not_true, Bool.and_false, Bool.xor_false] cases b <;> cases bodd n <;> rfl lemma div2_bit (b n) : div2 (bit b n) = n := by rw [bit_val, div2_val, Nat.add_comm, add_mul_div_left, div_eq_of_lt, Nat.zero_add] <;> cases b <;> decide lemma shiftLeft'_add (b m n) : ∀ k, shiftLeft' b m (n + k) = shiftLeft' b (shiftLeft' b m n) k \| 0 => rfl \| k + 1 => congr_arg (bit b) (shiftLeft'_add b m n k) lemma shiftLeft'_sub (b m) : ∀ {n k}, k ≤ n → shiftLeft' b m (n - k) = (shiftLeft' b m n) >>> k \| _, 0, _ => rfl \| n + 1, k + 1, h => by rw [succ_sub_succ_eq_sub, shiftLeft', Nat.add_comm, shiftRight_add] simp only [shiftLeft'_sub, Nat.le_of_succ_le_succ h, shiftRight_succ, shiftRight_zero] simp [← div2_val, div2_bit] lemma shiftLeft_sub : ∀ (m : Nat) {n k}, k ≤ n → m <<< (n - k) = (m <<< n) >>> k := fun _ _ _ hk => by simp only [← shiftLeft'_false, shiftLeft'_sub false _ hk] lemma bodd_eq_one_and_ne_zero : ∀ n, bodd n = (1 &&& n != 0) \| 0 => rfl \| 1 => rfl \| n + 2 => by simpa using bodd_eq_one_and_ne_zero n lemma testBit_bit_succ (m b n) : testBit (bit b n) (succ m) = testBit n m := by have : bodd (((bit b n) >>> 1) >>> m) = bodd (n >>> m) := by simp only [shiftRight_eq_div_pow] simp [← div2_val, div2_bit] rw [← shiftRight_add, Nat.add_comm] at this simp only [bodd_eq_one_and_ne_zero] at this exact this /-! ### `boddDiv2_eq` and `bodd` -/ @[simp] theorem boddDiv2_eq (n : ℕ) : boddDiv2 n = (bodd n, div2 n) := rfl @[simp] theorem div2_bit0 (n) : div2 (2 * n) = n := div2_bit false n -- simp can prove this theorem div2_bit1 (n) : div2 (2 * n + 1) = n := div2_bit true n /-! ### `bit0` and `bit1` -/ theorem bit_add : ∀ (b : Bool) (n m : ℕ), bit b (n + m) = bit false n + bit b m \| true, _, _ => by dsimp [bit]; omega \| false, _, _ => by dsimp [bit]; omega theorem bit_add' : ∀ (b : Bool) (n m : ℕ), bit b (n + m) = bit b n + bit false m \| true, _, _ => by dsimp [bit]; omega \| false, _, _ => by dsimp [bit]; omega theorem bit_ne_zero (b) {n} (h : n ≠ 0) : bit b n ≠ 0 := by cases b <;> dsimp [bit] <;> omega @[simp] theorem bitCasesOn_bit0 {motive : ℕ → Sort u} (H : ∀ b n, motive (bit b n)) (n : ℕ) : bitCasesOn (2 * n) H = H false n := bitCasesOn_bit H false n @[simp] theorem bitCasesOn_bit1 {motive : ℕ → Sort u} (H : ∀ b n, motive (bit b n)) (n : ℕ) : bitCasesOn (2 * n + 1) H = H true n := bitCasesOn_bit H true n theorem bit_cases_on_injective {motive : ℕ → Sort u} : Function.Injective fun H : ∀ b n, motive (bit b n) => fun n => bitCasesOn n H := by intro H₁ H₂ h ext b n simpa only [bitCasesOn_bit] using congr_fun h (bit b n) @[simp] theorem bit_cases_on_inj {motive : ℕ → Sort u} (H₁ H₂ : ∀ b n, motive (bit b n)) : ((fun n => bitCasesOn n H₁) = fun n => bitCasesOn n H₂) ↔ H₁ = H₂ := bit_cases_on_injective.eq_iff lemma bit_le : ∀ (b : Bool) {m n : ℕ}, m ≤ n → bit b m ≤ bit b n \| true, _, _, h => by dsimp [bit]; omega \| false, _, _, h => by dsimp [bit]; omega lemma bit_lt_bit (a b) (h : m < n) : bit a m < bit b n := calc bit a m < 2 * n := by cases a <;> dsimp [bit] <;> omega _ ≤ bit b n := by cases b <;> dsimp [bit] <;> omega @[simp] theorem zero_bits : bits 0 = [] := by simp [Nat.bits] @[simp] theorem bits_append_bit (n : ℕ) (b : Bool) (hn : n = 0 → b = true) : (bit b n).bits = b :: n.bits := by rw [Nat.bits, Nat.bits, binaryRec_eq] simpa	@[simp] theorem bit0_bits (n : ℕ) (hn : n ≠ 0) : (2 * n).bits = false :: n.bits := bits_append_bit n false fun hn' => absurd hn' hn @[simp] theorem bit1_bits (n : ℕ) : (2 * n + 1).bits = true :: n.bits :=	Mathlib/Data/Nat/Bits.lean	270	275
/- Copyright (c) 2021 Andrew Yang. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Andrew Yang -/ import Mathlib.Topology.Sets.Closeds import Mathlib.Topology.Sets.OpenCover /-! # Sober spaces A quasi-sober space is a topological space where every irreducible closed subset has a generic point. A sober space is a quasi-sober space where every irreducible closed subset has a unique generic point. This is if and only if the space is T0, and thus sober spaces can be stated via `[QuasiSober α] [T0Space α]`. ## Main definition * `IsGenericPoint` : `x` is the generic point of `S` if `S` is the closure of `x`. * `QuasiSober` : A space is quasi-sober if every irreducible closed subset has a generic point. * `genericPoints` : The set of generic points of irreducible components. -/ open Set variable {α β : Type} [TopologicalSpace α] [TopologicalSpace β] section genericPoint /-- `x` is a generic point of `S` if `S` is the closure of `x`. -/ def IsGenericPoint (x : α) (S : Set α) : Prop := closure ({x} : Set α) = S theorem isGenericPoint_def {x : α} {S : Set α} : IsGenericPoint x S ↔ closure ({x} : Set α) = S := Iff.rfl theorem IsGenericPoint.def {x : α} {S : Set α} (h : IsGenericPoint x S) : closure ({x} : Set α) = S := h theorem isGenericPoint_closure {x : α} : IsGenericPoint x (closure ({x} : Set α)) := refl _ variable {x y : α} {S U Z : Set α} theorem isGenericPoint_iff_specializes : IsGenericPoint x S ↔ ∀ y, x ⤳ y ↔ y ∈ S := by simp only [specializes_iff_mem_closure, IsGenericPoint, Set.ext_iff] namespace IsGenericPoint theorem specializes_iff_mem (h : IsGenericPoint x S) : x ⤳ y ↔ y ∈ S := isGenericPoint_iff_specializes.1 h y protected theorem specializes (h : IsGenericPoint x S) (h' : y ∈ S) : x ⤳ y := h.specializes_iff_mem.2 h' protected theorem mem (h : IsGenericPoint x S) : x ∈ S := h.specializes_iff_mem.1 specializes_rfl protected theorem isClosed (h : IsGenericPoint x S) : IsClosed S := h.def ▸ isClosed_closure protected theorem isIrreducible (h : IsGenericPoint x S) : IsIrreducible S := h.def ▸ isIrreducible_singleton.closure protected theorem inseparable (h : IsGenericPoint x S) (h' : IsGenericPoint y S) : Inseparable x y := (h.specializes h'.mem).antisymm (h'.specializes h.mem) /-- In a T₀ space, each set has at most one generic point. -/ protected theorem eq [T0Space α] (h : IsGenericPoint x S) (h' : IsGenericPoint y S) : x = y := (h.inseparable h').eq theorem mem_open_set_iff (h : IsGenericPoint x S) (hU : IsOpen U) : x ∈ U ↔ (S ∩ U).Nonempty := ⟨fun h' => ⟨x, h.mem, h'⟩, fun ⟨_y, hyS, hyU⟩ => (h.specializes hyS).mem_open hU hyU⟩ theorem disjoint_iff (h : IsGenericPoint x S) (hU : IsOpen U) : Disjoint S U ↔ x ∉ U := by rw [h.mem_open_set_iff hU, ← not_disjoint_iff_nonempty_inter, Classical.not_not] theorem mem_closed_set_iff (h : IsGenericPoint x S) (hZ : IsClosed Z) : x ∈ Z ↔ S ⊆ Z := by rw [← h.def, hZ.closure_subset_iff, singleton_subset_iff] protected theorem image (h : IsGenericPoint x S) {f : α → β} (hf : Continuous f) : IsGenericPoint (f x) (closure (f '' S)) := by rw [isGenericPoint_def, ← h.def, ← image_singleton, closure_image_closure hf] end IsGenericPoint theorem isGenericPoint_iff_forall_closed (hS : IsClosed S) (hxS : x ∈ S) : IsGenericPoint x S ↔ ∀ Z : Set α, IsClosed Z → x ∈ Z → S ⊆ Z := by have : closure {x} ⊆ S := closure_minimal (singleton_subset_iff.2 hxS) hS simp_rw [IsGenericPoint, subset_antisymm_iff, this, true_and, closure, subset_sInter_iff, mem_setOf_eq, and_imp, singleton_subset_iff] end genericPoint section Sober /-- A space is sober if every irreducible closed subset has a generic point. -/ @[mk_iff] class QuasiSober (α : Type) [TopologicalSpace α] : Prop where sober : ∀ {S : Set α}, IsIrreducible S → IsClosed S → ∃ x, IsGenericPoint x S /-- A generic point of the closure of an irreducible space. -/ noncomputable def IsIrreducible.genericPoint [QuasiSober α] {S : Set α} (hS : IsIrreducible S) : α := (QuasiSober.sober hS.closure isClosed_closure).choose theorem IsIrreducible.isGenericPoint_genericPoint_closure [QuasiSober α] {S : Set α} (hS : IsIrreducible S) : IsGenericPoint hS.genericPoint (closure S) := (QuasiSober.sober hS.closure isClosed_closure).choose_spec theorem IsIrreducible.isGenericPoint_genericPoint [QuasiSober α] {S : Set α} (hS : IsIrreducible S) (hS' : IsClosed S) : IsGenericPoint hS.genericPoint S := by convert hS.isGenericPoint_genericPoint_closure; exact hS'.closure_eq.symm @[simp] theorem IsIrreducible.genericPoint_closure_eq [QuasiSober α] {S : Set α} (hS : IsIrreducible S) : closure ({hS.genericPoint} : Set α) = closure S := hS.isGenericPoint_genericPoint_closure theorem IsIrreducible.closure_genericPoint [QuasiSober α] {S : Set α} (hS : IsIrreducible S) (hS' : IsClosed S) : closure ({hS.genericPoint} : Set α) = S := hS.isGenericPoint_genericPoint_closure.trans hS'.closure_eq variable (α) /-- A generic point of a sober irreducible space. -/ noncomputable def genericPoint [QuasiSober α] [IrreducibleSpace α] : α := (IrreducibleSpace.isIrreducible_univ α).genericPoint theorem genericPoint_spec [QuasiSober α] [IrreducibleSpace α] : IsGenericPoint (genericPoint α) univ := by simpa using (IrreducibleSpace.isIrreducible_univ α).isGenericPoint_genericPoint_closure @[simp] theorem genericPoint_closure [QuasiSober α] [IrreducibleSpace α] : closure ({genericPoint α} : Set α) = univ := genericPoint_spec α variable {α}	theorem genericPoint_specializes [QuasiSober α] [IrreducibleSpace α] (x : α) : genericPoint α ⤳ x := (IsIrreducible.isGenericPoint_genericPoint_closure _).specializes (by simp)	Mathlib/Topology/Sober.lean	148	150
/- Copyright (c) 2024 Joël Riou. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Joël Riou -/ import Mathlib.CategoryTheory.Category.Preorder import Mathlib.CategoryTheory.EqToHom /-! # Functors from the category of the ordered set `ℕ` In this file, we provide a constructor `Functor.ofSequence` for functors `ℕ ⥤ C` which takes as an input a sequence of morphisms `f : X n ⟶ X (n + 1)` for all `n : ℕ`. We also provide a constructor `NatTrans.ofSequence` for natural transformations between functors `ℕ ⥤ C` which allows to check the naturality condition only for morphisms `n ⟶ n + 1`. The duals of the above for functors `ℕᵒᵖ ⥤ C` are given by `Functor.ofOpSequence` and `NatTrans.ofOpSequence`. -/ namespace CategoryTheory open Category variable {C : Type*} [Category C] namespace Functor variable {X : ℕ → C} (f : ∀ n, X n ⟶ X (n + 1)) namespace OfSequence lemma congr_f (i j : ℕ) (h : i = j) : f i = eqToHom (by rw [h]) ≫ f j ≫ eqToHom (by rw [h]) := by subst h simp /-- The morphism `X i ⟶ X j` obtained by composing morphisms of the form `X n ⟶ X (n + 1)` when `i ≤ j`. -/ def map : ∀ {X : ℕ → C} (_ : ∀ n, X n ⟶ X (n + 1)) (i j : ℕ), i ≤ j → (X i ⟶ X j) \| _, _, 0, 0 => fun _ ↦ 𝟙 _ \| _, f, 0, 1 => fun _ ↦ f 0 \| _, f, 0, l + 1 => fun _ ↦ f 0 ≫ map (fun n ↦ f (n + 1)) 0 l (by omega) \| _, _, _ + 1, 0 => nofun	\| _, f, k + 1, l + 1 => fun _ ↦ map (fun n ↦ f (n + 1)) k l (by omega) lemma map_id (i : ℕ) : map f i i (by omega) = 𝟙 _ := by revert X f induction i with \| zero => intros; rfl \| succ _ hi =>	Mathlib/CategoryTheory/Functor/OfSequence.lean	49	55
/- Copyright (c) 2019 Neil Strickland. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Authors: Neil Strickland -/ import Mathlib.Tactic.Ring import Mathlib.Data.PNat.Prime /-! # Euclidean algorithm for ℕ This file sets up a version of the Euclidean algorithm that only works with natural numbers. Given `0 < a, b`, it computes the unique `(w, x, y, z, d)` such that the following identities hold: * `a = (w + x) d` * `b = (y + z) d` * `w * z = x * y + 1` `d` is then the gcd of `a` and `b`, and `a' := a / d = w + x` and `b' := b / d = y + z` are coprime. This story is closely related to the structure of SL₂(ℕ) (as a free monoid on two generators) and the theory of continued fractions. ## Main declarations * `XgcdType`: Helper type in defining the gcd. Encapsulates `(wp, x, y, zp, ap, bp)`. where `wp` `zp`, `ap`, `bp` are the variables getting changed through the algorithm. * `IsSpecial`: States `wp * zp = x * y + 1` * `IsReduced`: States `ap = a ∧ bp = b` ## Notes See `Nat.Xgcd` for a very similar algorithm allowing values in `ℤ`. -/ open Nat namespace PNat /-- A term of `XgcdType` is a system of six naturals. They should be thought of as representing the matrix [[w, x], [y, z]] = [[wp + 1, x], [y, zp + 1]] together with the vector [a, b] = [ap + 1, bp + 1]. -/ structure XgcdType where /-- `wp` is a variable which changes through the algorithm. -/ wp : ℕ /-- `x` satisfies `a / d = w + x` at the final step. -/ x : ℕ /-- `y` satisfies `b / d = z + y` at the final step. -/ y : ℕ /-- `zp` is a variable which changes through the algorithm. -/ zp : ℕ /-- `ap` is a variable which changes through the algorithm. -/ ap : ℕ /-- `bp` is a variable which changes through the algorithm. -/ bp : ℕ deriving Inhabited namespace XgcdType variable (u : XgcdType) instance : SizeOf XgcdType := ⟨fun u => u.bp⟩ /-- The `Repr` instance converts terms to strings in a way that reflects the matrix/vector interpretation as above. -/ instance : Repr XgcdType where reprPrec \| g, _ => s!"[[[{repr (g.wp + 1)}, {repr g.x}], \ [{repr g.y}, {repr (g.zp + 1)}]], \ [{repr (g.ap + 1)}, {repr (g.bp + 1)}]]" /-- Another `mk` using ℕ and ℕ+ -/ def mk' (w : ℕ+) (x : ℕ) (y : ℕ) (z : ℕ+) (a : ℕ+) (b : ℕ+) : XgcdType := mk w.val.pred x y z.val.pred a.val.pred b.val.pred /-- `w = wp + 1` -/ def w : ℕ+ := succPNat u.wp /-- `z = zp + 1` -/ def z : ℕ+ := succPNat u.zp /-- `a = ap + 1` -/ def a : ℕ+ := succPNat u.ap /-- `b = bp + 1` -/ def b : ℕ+ := succPNat u.bp /-- `r = a % b`: remainder -/ def r : ℕ := (u.ap + 1) % (u.bp + 1) /-- `q = ap / bp`: quotient -/ def q : ℕ := (u.ap + 1) / (u.bp + 1) /-- `qp = q - 1` -/ def qp : ℕ := u.q - 1 /-- The map `v` gives the product of the matrix [[w, x], [y, z]] = [[wp + 1, x], [y, zp + 1]] and the vector [a, b] = [ap + 1, bp + 1]. The map `vp` gives [sp, tp] such that v = [sp + 1, tp + 1]. -/ def vp : ℕ × ℕ := ⟨u.wp + u.x + u.ap + u.wp * u.ap + u.x * u.bp, u.y + u.zp + u.bp + u.y * u.ap + u.zp * u.bp⟩ /-- `v = [sp + 1, tp + 1]`, check `vp` -/ def v : ℕ × ℕ := ⟨u.w * u.a + u.x * u.b, u.y * u.a + u.z * u.b⟩ /-- `succ₂ [t.1, t.2] = [t.1.succ, t.2.succ]` -/ def succ₂ (t : ℕ × ℕ) : ℕ × ℕ := ⟨t.1.succ, t.2.succ⟩ theorem v_eq_succ_vp : u.v = succ₂ u.vp := by ext <;> dsimp [v, vp, w, z, a, b, succ₂] <;> ring_nf /-- `IsSpecial` holds if the matrix has determinant one. -/ def IsSpecial : Prop := u.wp + u.zp + u.wp * u.zp = u.x * u.y /-- `IsSpecial'` is an alternative of `IsSpecial`. -/ def IsSpecial' : Prop := u.w * u.z = succPNat (u.x * u.y) theorem isSpecial_iff : u.IsSpecial ↔ u.IsSpecial' := by dsimp [IsSpecial, IsSpecial'] let ⟨wp, x, y, zp, ap, bp⟩ := u constructor <;> intro h <;> simp only [w, succPNat, succ_eq_add_one, z] at * <;> simp only [← coe_inj, mul_coe, mk_coe] at * · simp_all [← h]; ring · simp [Nat.mul_add, Nat.add_mul, ← Nat.add_assoc] at h; rw [← h]; ring /-- `IsReduced` holds if the two entries in the vector are the same. The reduction algorithm will produce a system with this property, whose product vector is the same as for the original system. -/ def IsReduced : Prop := u.ap = u.bp /-- `IsReduced'` is an alternative of `IsReduced`. -/ def IsReduced' : Prop := u.a = u.b theorem isReduced_iff : u.IsReduced ↔ u.IsReduced' := succPNat_inj.symm /-- `flip` flips the placement of variables during the algorithm. -/ def flip : XgcdType where wp := u.zp x := u.y y := u.x zp := u.wp ap := u.bp bp := u.ap @[simp] theorem flip_w : (flip u).w = u.z := rfl @[simp] theorem flip_x : (flip u).x = u.y := rfl @[simp] theorem flip_y : (flip u).y = u.x := rfl @[simp] theorem flip_z : (flip u).z = u.w := rfl @[simp] theorem flip_a : (flip u).a = u.b := rfl @[simp] theorem flip_b : (flip u).b = u.a := rfl theorem flip_isReduced : (flip u).IsReduced ↔ u.IsReduced := by dsimp [IsReduced, flip] constructor <;> intro h <;> exact h.symm theorem flip_isSpecial : (flip u).IsSpecial ↔ u.IsSpecial := by dsimp [IsSpecial, flip] rw [mul_comm u.x, mul_comm u.zp, add_comm u.zp] theorem flip_v : (flip u).v = u.v.swap := by dsimp [v] ext · simp only ring · simp only ring /-- Properties of division with remainder for a / b. -/ theorem rq_eq : u.r + (u.bp + 1) * u.q = u.ap + 1 := Nat.mod_add_div (u.ap + 1) (u.bp + 1) theorem qp_eq (hr : u.r = 0) : u.q = u.qp + 1 := by by_cases hq : u.q = 0 · let h := u.rq_eq rw [hr, hq, mul_zero, add_zero] at h cases h · exact (Nat.succ_pred_eq_of_pos (Nat.pos_of_ne_zero hq)).symm /-- The following function provides the starting point for our algorithm. We will apply an iterative reduction process to it, which will produce a system satisfying IsReduced. The gcd can be read off from this final system. -/ def start (a b : ℕ+) : XgcdType := ⟨0, 0, 0, 0, a - 1, b - 1⟩ theorem start_isSpecial (a b : ℕ+) : (start a b).IsSpecial := by dsimp [start, IsSpecial] theorem start_v (a b : ℕ+) : (start a b).v = ⟨a, b⟩ := by	dsimp [start, v, XgcdType.a, XgcdType.b, w, z] rw [one_mul, one_mul, zero_mul, zero_mul] have := a.pos have := b.pos congr <;> omega /-- `finish` happens when the reducing process ends. -/	Mathlib/Data/PNat/Xgcd.lean	227	233

Subsets and Splits

No community queries yet

The top public SQL queries from the community will appear here once available.