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Context stringlengths 57 92.3k	file_name stringlengths 21 79	start int64 14 3.67k	end int64 18 3.69k	theorem stringlengths 25 2.71k	proof stringlengths 5 10.6k
import Mathlib.MeasureTheory.Measure.ProbabilityMeasure import Mathlib.MeasureTheory.Measure.Lebesgue.Basic import Mathlib.MeasureTheory.Integral.Layercake import Mathlib.MeasureTheory.Integral.BoundedContinuousFunction #align_import measure_theory.measure.portmanteau from "leanprover-community/mathlib"@"fd5edc43dc4f10b85abfe544b88f82cf13c5f844" noncomputable section open MeasureTheory Set Filter BoundedContinuousFunction open scoped Topology ENNReal NNReal BoundedContinuousFunction namespace MeasureTheory section LimsupClosedLEAndLELiminfOpen variable {Ω : Type} [MeasurableSpace Ω] theorem le_measure_compl_liminf_of_limsup_measure_le {ι : Type} {L : Filter ι} {μ : Measure Ω} {μs : ι → Measure Ω} [IsProbabilityMeasure μ] [∀ i, IsProbabilityMeasure (μs i)] {E : Set Ω} (E_mble : MeasurableSet E) (h : (L.limsup fun i => μs i E) ≤ μ E) : μ Eᶜ ≤ L.liminf fun i => μs i Eᶜ := by rcases L.eq_or_neBot with rfl \| hne · simp only [liminf_bot, le_top] have meas_Ec : μ Eᶜ = 1 - μ E := by simpa only [measure_univ] using measure_compl E_mble (measure_lt_top μ E).ne have meas_i_Ec : ∀ i, μs i Eᶜ = 1 - μs i E := by intro i simpa only [measure_univ] using measure_compl E_mble (measure_lt_top (μs i) E).ne simp_rw [meas_Ec, meas_i_Ec] have obs : (L.liminf fun i : ι => 1 - μs i E) = L.liminf ((fun x => 1 - x) ∘ fun i : ι => μs i E) := rfl rw [obs] have := antitone_const_tsub.map_limsup_of_continuousAt (F := L) (fun i => μs i E) (ENNReal.continuous_sub_left ENNReal.one_ne_top).continuousAt simp_rw [← this] exact antitone_const_tsub h #align measure_theory.le_measure_compl_liminf_of_limsup_measure_le MeasureTheory.le_measure_compl_liminf_of_limsup_measure_le theorem le_measure_liminf_of_limsup_measure_compl_le {ι : Type} {L : Filter ι} {μ : Measure Ω} {μs : ι → Measure Ω} [IsProbabilityMeasure μ] [∀ i, IsProbabilityMeasure (μs i)] {E : Set Ω} (E_mble : MeasurableSet E) (h : (L.limsup fun i => μs i Eᶜ) ≤ μ Eᶜ) : μ E ≤ L.liminf fun i => μs i E := compl_compl E ▸ le_measure_compl_liminf_of_limsup_measure_le (MeasurableSet.compl E_mble) h #align measure_theory.le_measure_liminf_of_limsup_measure_compl_le MeasureTheory.le_measure_liminf_of_limsup_measure_compl_le theorem limsup_measure_compl_le_of_le_liminf_measure {ι : Type} {L : Filter ι} {μ : Measure Ω} {μs : ι → Measure Ω} [IsProbabilityMeasure μ] [∀ i, IsProbabilityMeasure (μs i)] {E : Set Ω} (E_mble : MeasurableSet E) (h : μ E ≤ L.liminf fun i => μs i E) : (L.limsup fun i => μs i Eᶜ) ≤ μ Eᶜ := by rcases L.eq_or_neBot with rfl \| hne · simp only [limsup_bot, bot_le] have meas_Ec : μ Eᶜ = 1 - μ E := by simpa only [measure_univ] using measure_compl E_mble (measure_lt_top μ E).ne have meas_i_Ec : ∀ i, μs i Eᶜ = 1 - μs i E := by intro i simpa only [measure_univ] using measure_compl E_mble (measure_lt_top (μs i) E).ne simp_rw [meas_Ec, meas_i_Ec] have obs : (L.limsup fun i : ι => 1 - μs i E) = L.limsup ((fun x => 1 - x) ∘ fun i : ι => μs i E) := rfl rw [obs] have := antitone_const_tsub.map_liminf_of_continuousAt (F := L) (fun i => μs i E) (ENNReal.continuous_sub_left ENNReal.one_ne_top).continuousAt simp_rw [← this] exact antitone_const_tsub h #align measure_theory.limsup_measure_compl_le_of_le_liminf_measure MeasureTheory.limsup_measure_compl_le_of_le_liminf_measure theorem limsup_measure_le_of_le_liminf_measure_compl {ι : Type} {L : Filter ι} {μ : Measure Ω} {μs : ι → Measure Ω} [IsProbabilityMeasure μ] [∀ i, IsProbabilityMeasure (μs i)] {E : Set Ω} (E_mble : MeasurableSet E) (h : μ Eᶜ ≤ L.liminf fun i => μs i Eᶜ) : (L.limsup fun i => μs i E) ≤ μ E := compl_compl E ▸ limsup_measure_compl_le_of_le_liminf_measure (MeasurableSet.compl E_mble) h #align measure_theory.limsup_measure_le_of_le_liminf_measure_compl MeasureTheory.limsup_measure_le_of_le_liminf_measure_compl variable [TopologicalSpace Ω] [OpensMeasurableSpace Ω] theorem limsup_measure_closed_le_iff_liminf_measure_open_ge {ι : Type} {L : Filter ι} {μ : Measure Ω} {μs : ι → Measure Ω} [IsProbabilityMeasure μ] [∀ i, IsProbabilityMeasure (μs i)] : (∀ F, IsClosed F → (L.limsup fun i => μs i F) ≤ μ F) ↔ ∀ G, IsOpen G → μ G ≤ L.liminf fun i => μs i G := by constructor · intro h G G_open exact le_measure_liminf_of_limsup_measure_compl_le G_open.measurableSet (h Gᶜ (isClosed_compl_iff.mpr G_open)) · intro h F F_closed exact limsup_measure_le_of_le_liminf_measure_compl F_closed.measurableSet (h Fᶜ (isOpen_compl_iff.mpr F_closed)) #align measure_theory.limsup_measure_closed_le_iff_liminf_measure_open_ge MeasureTheory.limsup_measure_closed_le_iff_liminf_measure_open_ge end LimsupClosedLEAndLELiminfOpen -- section section TendstoOfNullFrontier variable {Ω : Type} [MeasurableSpace Ω] theorem tendsto_measure_of_le_liminf_measure_of_limsup_measure_le {ι : Type} {L : Filter ι} {μ : Measure Ω} {μs : ι → Measure Ω} {E₀ E E₁ : Set Ω} (E₀_subset : E₀ ⊆ E) (subset_E₁ : E ⊆ E₁) (nulldiff : μ (E₁ \ E₀) = 0) (h_E₀ : μ E₀ ≤ L.liminf fun i => μs i E₀) (h_E₁ : (L.limsup fun i => μs i E₁) ≤ μ E₁) : L.Tendsto (fun i => μs i E) (𝓝 (μ E)) := by apply tendsto_of_le_liminf_of_limsup_le · have E₀_ae_eq_E : E₀ =ᵐ[μ] E := EventuallyLE.antisymm E₀_subset.eventuallyLE (subset_E₁.eventuallyLE.trans (ae_le_set.mpr nulldiff)) calc μ E = μ E₀ := measure_congr E₀_ae_eq_E.symm _ ≤ L.liminf fun i => μs i E₀ := h_E₀ _ ≤ L.liminf fun i => μs i E := liminf_le_liminf (eventually_of_forall fun _ => measure_mono E₀_subset) · have E_ae_eq_E₁ : E =ᵐ[μ] E₁ := EventuallyLE.antisymm subset_E₁.eventuallyLE ((ae_le_set.mpr nulldiff).trans E₀_subset.eventuallyLE) calc (L.limsup fun i => μs i E) ≤ L.limsup fun i => μs i E₁ := limsup_le_limsup (eventually_of_forall fun _ => measure_mono subset_E₁) _ ≤ μ E₁ := h_E₁ _ = μ E := measure_congr E_ae_eq_E₁.symm · infer_param · infer_param #align measure_theory.tendsto_measure_of_le_liminf_measure_of_limsup_measure_le MeasureTheory.tendsto_measure_of_le_liminf_measure_of_limsup_measure_le variable [TopologicalSpace Ω] [OpensMeasurableSpace Ω] theorem tendsto_measure_of_null_frontier {ι : Type} {L : Filter ι} {μ : Measure Ω} {μs : ι → Measure Ω} [IsProbabilityMeasure μ] [∀ i, IsProbabilityMeasure (μs i)] (h_opens : ∀ G, IsOpen G → μ G ≤ L.liminf fun i => μs i G) {E : Set Ω} (E_nullbdry : μ (frontier E) = 0) : L.Tendsto (fun i => μs i E) (𝓝 (μ E)) := haveI h_closeds : ∀ F, IsClosed F → (L.limsup fun i => μs i F) ≤ μ F := limsup_measure_closed_le_iff_liminf_measure_open_ge.mpr h_opens tendsto_measure_of_le_liminf_measure_of_limsup_measure_le interior_subset subset_closure E_nullbdry (h_opens _ isOpen_interior) (h_closeds _ isClosed_closure) #align measure_theory.tendsto_measure_of_null_frontier MeasureTheory.tendsto_measure_of_null_frontier end TendstoOfNullFrontier --section section ConvergenceImpliesLimsupClosedLE theorem FiniteMeasure.limsup_measure_closed_le_of_tendsto {Ω ι : Type} {L : Filter ι} [MeasurableSpace Ω] [TopologicalSpace Ω] [HasOuterApproxClosed Ω] [OpensMeasurableSpace Ω] {μ : FiniteMeasure Ω} {μs : ι → FiniteMeasure Ω} (μs_lim : Tendsto μs L (𝓝 μ)) {F : Set Ω} (F_closed : IsClosed F) : (L.limsup fun i => (μs i : Measure Ω) F) ≤ (μ : Measure Ω) F := by rcases L.eq_or_neBot with rfl \| hne · simp only [limsup_bot, bot_le] apply ENNReal.le_of_forall_pos_le_add intro ε ε_pos _ let fs := F_closed.apprSeq have key₁ : Tendsto (fun n ↦ ∫⁻ ω, (fs n ω : ℝ≥0∞) ∂μ) atTop (𝓝 ((μ : Measure Ω) F)) := HasOuterApproxClosed.tendsto_lintegral_apprSeq F_closed (μ : Measure Ω) have room₁ : (μ : Measure Ω) F < (μ : Measure Ω) F + ε / 2 := by apply ENNReal.lt_add_right (measure_lt_top (μ : Measure Ω) F).ne (ENNReal.div_pos_iff.mpr ⟨(ENNReal.coe_pos.mpr ε_pos).ne.symm, ENNReal.two_ne_top⟩).ne.symm rcases eventually_atTop.mp (eventually_lt_of_tendsto_lt room₁ key₁) with ⟨M, hM⟩ have key₂ := FiniteMeasure.tendsto_iff_forall_lintegral_tendsto.mp μs_lim (fs M) have room₂ : (lintegral (μ : Measure Ω) fun a => fs M a) < (lintegral (μ : Measure Ω) fun a => fs M a) + ε / 2 := by apply ENNReal.lt_add_right (ne_of_lt ?_) (ENNReal.div_pos_iff.mpr ⟨(ENNReal.coe_pos.mpr ε_pos).ne.symm, ENNReal.two_ne_top⟩).ne.symm apply BoundedContinuousFunction.lintegral_lt_top_of_nnreal have ev_near := Eventually.mono (eventually_lt_of_tendsto_lt room₂ key₂) fun n => le_of_lt have ev_near' := Eventually.mono ev_near (fun n ↦ le_trans (HasOuterApproxClosed.measure_le_lintegral F_closed (μs n) M)) apply (Filter.limsup_le_limsup ev_near').trans rw [limsup_const] apply le_trans (add_le_add (hM M rfl.le).le (le_refl (ε / 2 : ℝ≥0∞))) simp only [add_assoc, ENNReal.add_halves, le_refl] #align measure_theory.finite_measure.limsup_measure_closed_le_of_tendsto MeasureTheory.FiniteMeasure.limsup_measure_closed_le_of_tendsto theorem ProbabilityMeasure.limsup_measure_closed_le_of_tendsto {Ω ι : Type} {L : Filter ι} [MeasurableSpace Ω] [TopologicalSpace Ω] [OpensMeasurableSpace Ω] [HasOuterApproxClosed Ω] {μ : ProbabilityMeasure Ω} {μs : ι → ProbabilityMeasure Ω} (μs_lim : Tendsto μs L (𝓝 μ)) {F : Set Ω} (F_closed : IsClosed F) : (L.limsup fun i => (μs i : Measure Ω) F) ≤ (μ : Measure Ω) F := by apply FiniteMeasure.limsup_measure_closed_le_of_tendsto ((ProbabilityMeasure.tendsto_nhds_iff_toFiniteMeasure_tendsto_nhds L).mp μs_lim) F_closed #align measure_theory.probability_measure.limsup_measure_closed_le_of_tendsto MeasureTheory.ProbabilityMeasure.limsup_measure_closed_le_of_tendsto theorem ProbabilityMeasure.le_liminf_measure_open_of_tendsto {Ω ι : Type} {L : Filter ι} [MeasurableSpace Ω] [PseudoEMetricSpace Ω] [OpensMeasurableSpace Ω] [HasOuterApproxClosed Ω] {μ : ProbabilityMeasure Ω} {μs : ι → ProbabilityMeasure Ω} (μs_lim : Tendsto μs L (𝓝 μ)) {G : Set Ω} (G_open : IsOpen G) : (μ : Measure Ω) G ≤ L.liminf fun i => (μs i : Measure Ω) G := haveI h_closeds : ∀ F, IsClosed F → (L.limsup fun i ↦ (μs i : Measure Ω) F) ≤ (μ : Measure Ω) F := fun _ F_closed => ProbabilityMeasure.limsup_measure_closed_le_of_tendsto μs_lim F_closed le_measure_liminf_of_limsup_measure_compl_le G_open.measurableSet (h_closeds _ (isClosed_compl_iff.mpr G_open)) #align measure_theory.probability_measure.le_liminf_measure_open_of_tendsto MeasureTheory.ProbabilityMeasure.le_liminf_measure_open_of_tendsto theorem ProbabilityMeasure.tendsto_measure_of_null_frontier_of_tendsto' {Ω ι : Type} {L : Filter ι} [MeasurableSpace Ω] [PseudoEMetricSpace Ω] [OpensMeasurableSpace Ω] [HasOuterApproxClosed Ω] {μ : ProbabilityMeasure Ω} {μs : ι → ProbabilityMeasure Ω} (μs_lim : Tendsto μs L (𝓝 μ)) {E : Set Ω} (E_nullbdry : (μ : Measure Ω) (frontier E) = 0) : Tendsto (fun i => (μs i : Measure Ω) E) L (𝓝 ((μ : Measure Ω) E)) := haveI h_opens : ∀ G, IsOpen G → (μ : Measure Ω) G ≤ L.liminf fun i => (μs i : Measure Ω) G := fun _ G_open => ProbabilityMeasure.le_liminf_measure_open_of_tendsto μs_lim G_open tendsto_measure_of_null_frontier h_opens E_nullbdry #align measure_theory.probability_measure.tendsto_measure_of_null_frontier_of_tendsto' MeasureTheory.ProbabilityMeasure.tendsto_measure_of_null_frontier_of_tendsto' theorem ProbabilityMeasure.tendsto_measure_of_null_frontier_of_tendsto {Ω ι : Type} {L : Filter ι} [MeasurableSpace Ω] [PseudoEMetricSpace Ω] [OpensMeasurableSpace Ω] [HasOuterApproxClosed Ω] {μ : ProbabilityMeasure Ω} {μs : ι → ProbabilityMeasure Ω} (μs_lim : Tendsto μs L (𝓝 μ)) {E : Set Ω} (E_nullbdry : μ (frontier E) = 0) : Tendsto (fun i => μs i E) L (𝓝 (μ E)) := by have E_nullbdry' : (μ : Measure Ω) (frontier E) = 0 := by rw [← ProbabilityMeasure.ennreal_coeFn_eq_coeFn_toMeasure, E_nullbdry, ENNReal.coe_zero] have key := ProbabilityMeasure.tendsto_measure_of_null_frontier_of_tendsto' μs_lim E_nullbdry' exact (ENNReal.tendsto_toNNReal (measure_ne_top (↑μ) E)).comp key #align measure_theory.probability_measure.tendsto_measure_of_null_frontier_of_tendsto MeasureTheory.ProbabilityMeasure.tendsto_measure_of_null_frontier_of_tendsto end ConvergenceImpliesLimsupClosedLE --section section LimitBorelImpliesLimsupClosedLE open ENNReal variable {Ω : Type*} [PseudoEMetricSpace Ω] [MeasurableSpace Ω] [OpensMeasurableSpace Ω]	Mathlib/MeasureTheory/Measure/Portmanteau.lean	399	410	theorem exists_null_frontier_thickening (μ : Measure Ω) [SigmaFinite μ] (s : Set Ω) {a b : ℝ} (hab : a < b) : ∃ r ∈ Ioo a b, μ (frontier (Metric.thickening r s)) = 0 := by	have mbles : ∀ r : ℝ, MeasurableSet (frontier (Metric.thickening r s)) := fun r => isClosed_frontier.measurableSet have disjs := Metric.frontier_thickening_disjoint s have key := Measure.countable_meas_pos_of_disjoint_iUnion (μ := μ) mbles disjs have aux := measure_diff_null (s := Ioo a b) (Set.Countable.measure_zero key volume) have len_pos : 0 < ENNReal.ofReal (b - a) := by simp only [hab, ENNReal.ofReal_pos, sub_pos] rw [← Real.volume_Ioo, ← aux] at len_pos rcases nonempty_of_measure_ne_zero len_pos.ne.symm with ⟨r, ⟨r_in_Ioo, hr⟩⟩ refine ⟨r, r_in_Ioo, ?_⟩ simpa only [mem_setOf_eq, not_lt, le_zero_iff] using hr
import Mathlib.Topology.MetricSpace.HausdorffDistance #align_import topology.metric_space.hausdorff_distance from "leanprover-community/mathlib"@"bc91ed7093bf098d253401e69df601fc33dde156" noncomputable section open NNReal ENNReal Topology Set Filter Bornology universe u v w variable {ι : Sort} {α : Type u} {β : Type v} namespace Metric section Cthickening variable [PseudoEMetricSpace α] {δ ε : ℝ} {s t : Set α} {x : α} open EMetric def cthickening (δ : ℝ) (E : Set α) : Set α := { x : α \| infEdist x E ≤ ENNReal.ofReal δ } #align metric.cthickening Metric.cthickening @[simp] theorem mem_cthickening_iff : x ∈ cthickening δ s ↔ infEdist x s ≤ ENNReal.ofReal δ := Iff.rfl #align metric.mem_cthickening_iff Metric.mem_cthickening_iff lemma eventually_not_mem_cthickening_of_infEdist_pos {E : Set α} {x : α} (h : x ∉ closure E) : ∀ᶠ δ in 𝓝 (0 : ℝ), x ∉ Metric.cthickening δ E := by obtain ⟨ε, ⟨ε_pos, ε_lt⟩⟩ := exists_real_pos_lt_infEdist_of_not_mem_closure h filter_upwards [eventually_lt_nhds ε_pos] with δ hδ simp only [cthickening, mem_setOf_eq, not_le] exact ((ofReal_lt_ofReal_iff ε_pos).mpr hδ).trans ε_lt theorem mem_cthickening_of_edist_le (x y : α) (δ : ℝ) (E : Set α) (h : y ∈ E) (h' : edist x y ≤ ENNReal.ofReal δ) : x ∈ cthickening δ E := (infEdist_le_edist_of_mem h).trans h' #align metric.mem_cthickening_of_edist_le Metric.mem_cthickening_of_edist_le theorem mem_cthickening_of_dist_le {α : Type} [PseudoMetricSpace α] (x y : α) (δ : ℝ) (E : Set α) (h : y ∈ E) (h' : dist x y ≤ δ) : x ∈ cthickening δ E := by apply mem_cthickening_of_edist_le x y δ E h rw [edist_dist] exact ENNReal.ofReal_le_ofReal h' #align metric.mem_cthickening_of_dist_le Metric.mem_cthickening_of_dist_le theorem cthickening_eq_preimage_infEdist (δ : ℝ) (E : Set α) : cthickening δ E = (fun x => infEdist x E) ⁻¹' Iic (ENNReal.ofReal δ) := rfl #align metric.cthickening_eq_preimage_inf_edist Metric.cthickening_eq_preimage_infEdist theorem isClosed_cthickening {δ : ℝ} {E : Set α} : IsClosed (cthickening δ E) := IsClosed.preimage continuous_infEdist isClosed_Iic #align metric.is_closed_cthickening Metric.isClosed_cthickening @[simp]	Mathlib/Topology/MetricSpace/Thickening.lean	238	239	theorem cthickening_empty (δ : ℝ) : cthickening δ (∅ : Set α) = ∅ := by	simp only [cthickening, ENNReal.ofReal_ne_top, setOf_false, infEdist_empty, top_le_iff]
import Mathlib.Analysis.Convex.Function #align_import analysis.convex.quasiconvex from "leanprover-community/mathlib"@"9003f28797c0664a49e4179487267c494477d853" open Function OrderDual Set variable {𝕜 E F β : Type*} section OrderedSemiring variable [OrderedSemiring 𝕜] section AddCommMonoid_E variable [AddCommMonoid E] [AddCommMonoid F] section LinearOrder_β variable [LinearOrder β] [SMul 𝕜 E] {s : Set E} {f g : E → β} theorem quasiconvexOn_iff_le_max : QuasiconvexOn 𝕜 s f ↔ Convex 𝕜 s ∧ ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → ∀ ⦃a b : 𝕜⦄, 0 ≤ a → 0 ≤ b → a + b = 1 → f (a • x + b • y) ≤ max (f x) (f y) := ⟨fun hf => ⟨hf.convex, fun _ hx _ hy _ _ ha hb hab => (hf _ ⟨hx, le_max_left _ _⟩ ⟨hy, le_max_right _ _⟩ ha hb hab).2⟩, fun hf _ _ hx _ hy _ _ ha hb hab => ⟨hf.1 hx.1 hy.1 ha hb hab, (hf.2 hx.1 hy.1 ha hb hab).trans <\| max_le hx.2 hy.2⟩⟩ #align quasiconvex_on_iff_le_max quasiconvexOn_iff_le_max theorem quasiconcaveOn_iff_min_le : QuasiconcaveOn 𝕜 s f ↔ Convex 𝕜 s ∧ ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → ∀ ⦃a b : 𝕜⦄, 0 ≤ a → 0 ≤ b → a + b = 1 → min (f x) (f y) ≤ f (a • x + b • y) := @quasiconvexOn_iff_le_max 𝕜 E βᵒᵈ _ _ _ _ _ _ #align quasiconcave_on_iff_min_le quasiconcaveOn_iff_min_le theorem quasilinearOn_iff_mem_uIcc : QuasilinearOn 𝕜 s f ↔ Convex 𝕜 s ∧ ∀ ⦃x⦄, x ∈ s → ∀ ⦃y⦄, y ∈ s → ∀ ⦃a b : 𝕜⦄, 0 ≤ a → 0 ≤ b → a + b = 1 → f (a • x + b • y) ∈ uIcc (f x) (f y) := by rw [QuasilinearOn, quasiconvexOn_iff_le_max, quasiconcaveOn_iff_min_le, and_and_and_comm, and_self_iff] apply and_congr_right' simp_rw [← forall_and, ← Icc_min_max, mem_Icc, and_comm] #align quasilinear_on_iff_mem_uIcc quasilinearOn_iff_mem_uIcc	Mathlib/Analysis/Convex/Quasiconvex.lean	146	150	theorem QuasiconvexOn.convex_lt (hf : QuasiconvexOn 𝕜 s f) (r : β) : Convex 𝕜 ({ x ∈ s \| f x < r }) := by	refine fun x hx y hy a b ha hb hab => ?_ have h := hf _ ⟨hx.1, le_max_left _ _⟩ ⟨hy.1, le_max_right _ _⟩ ha hb hab exact ⟨h.1, h.2.trans_lt <\| max_lt hx.2 hy.2⟩
import Mathlib.Tactic.Linarith import Mathlib.CategoryTheory.Skeletal import Mathlib.Data.Fintype.Sort import Mathlib.Order.Category.NonemptyFinLinOrd import Mathlib.CategoryTheory.Functor.ReflectsIso #align_import algebraic_topology.simplex_category from "leanprover-community/mathlib"@"e8ac6315bcfcbaf2d19a046719c3b553206dac75" universe v open CategoryTheory CategoryTheory.Limits def SimplexCategory := ℕ #align simplex_category SimplexCategory namespace SimplexCategory section -- Porting note: the definition of `SimplexCategory` is made irreducible below def mk (n : ℕ) : SimplexCategory := n #align simplex_category.mk SimplexCategory.mk scoped[Simplicial] notation "[" n "]" => SimplexCategory.mk n -- TODO: Make `len` irreducible. def len (n : SimplexCategory) : ℕ := n #align simplex_category.len SimplexCategory.len @[ext] theorem ext (a b : SimplexCategory) : a.len = b.len → a = b := id #align simplex_category.ext SimplexCategory.ext attribute [irreducible] SimplexCategory open Simplicial @[simp] theorem len_mk (n : ℕ) : [n].len = n := rfl #align simplex_category.len_mk SimplexCategory.len_mk @[simp] theorem mk_len (n : SimplexCategory) : ([n.len] : SimplexCategory) = n := rfl #align simplex_category.mk_len SimplexCategory.mk_len protected def rec {F : SimplexCategory → Sort*} (h : ∀ n : ℕ, F [n]) : ∀ X, F X := fun n => h n.len #align simplex_category.rec SimplexCategory.rec -- porting note (#5171): removed @[nolint has_nonempty_instance] protected def Hom (a b : SimplexCategory) := Fin (a.len + 1) →o Fin (b.len + 1) #align simplex_category.hom SimplexCategory.Hom instance smallCategory : SmallCategory.{0} SimplexCategory where Hom n m := SimplexCategory.Hom n m id m := SimplexCategory.Hom.id _ comp f g := SimplexCategory.Hom.comp g f #align simplex_category.small_category SimplexCategory.smallCategory @[simp] lemma id_toOrderHom (a : SimplexCategory) : Hom.toOrderHom (𝟙 a) = OrderHom.id := rfl @[simp] lemma comp_toOrderHom {a b c: SimplexCategory} (f : a ⟶ b) (g : b ⟶ c) : (f ≫ g).toOrderHom = g.toOrderHom.comp f.toOrderHom := rfl -- Porting note: added because `Hom.ext'` is not triggered automatically @[ext] theorem Hom.ext {a b : SimplexCategory} (f g : a ⟶ b) : f.toOrderHom = g.toOrderHom → f = g := Hom.ext' _ _ def const (x y : SimplexCategory) (i : Fin (y.len + 1)) : x ⟶ y := Hom.mk <\| ⟨fun _ => i, by tauto⟩ #align simplex_category.const SimplexCategory.const @[simp] lemma const_eq_id : const [0] [0] 0 = 𝟙 _ := by aesop @[simp] lemma const_apply (x y : SimplexCategory) (i : Fin (y.len + 1)) (a : Fin (x.len + 1)) : (const x y i).toOrderHom a = i := rfl @[simp] theorem const_comp (x : SimplexCategory) {y z : SimplexCategory} (f : y ⟶ z) (i : Fin (y.len + 1)) : const x y i ≫ f = const x z (f.toOrderHom i) := rfl #align simplex_category.const_comp SimplexCategory.const_comp @[simp] def mkHom {n m : ℕ} (f : Fin (n + 1) →o Fin (m + 1)) : ([n] : SimplexCategory) ⟶ [m] := SimplexCategory.Hom.mk f #align simplex_category.mk_hom SimplexCategory.mkHom theorem hom_zero_zero (f : ([0] : SimplexCategory) ⟶ [0]) : f = 𝟙 _ := by ext : 3 apply @Subsingleton.elim (Fin 1) #align simplex_category.hom_zero_zero SimplexCategory.hom_zero_zero end open Simplicial section Skeleton @[simps obj map] def skeletalFunctor : SimplexCategory ⥤ NonemptyFinLinOrd where obj a := NonemptyFinLinOrd.of (Fin (a.len + 1)) map f := f.toOrderHom #align simplex_category.skeletal_functor SimplexCategory.skeletalFunctor theorem skeletalFunctor.coe_map {Δ₁ Δ₂ : SimplexCategory} (f : Δ₁ ⟶ Δ₂) : ↑(skeletalFunctor.map f) = f.toOrderHom := rfl #align simplex_category.skeletal_functor.coe_map SimplexCategory.skeletalFunctor.coe_map theorem skeletal : Skeletal SimplexCategory := fun X Y ⟨I⟩ => by suffices Fintype.card (Fin (X.len + 1)) = Fintype.card (Fin (Y.len + 1)) by ext simpa apply Fintype.card_congr exact ((skeletalFunctor ⋙ forget NonemptyFinLinOrd).mapIso I).toEquiv #align simplex_category.skeletal SimplexCategory.skeletal lemma isSkeletonOf : IsSkeletonOf NonemptyFinLinOrd SimplexCategory skeletalFunctor where skel := skeletal eqv := SkeletalFunctor.isEquivalence #align simplex_category.is_skeleton_of SimplexCategory.isSkeletonOf def Truncated (n : ℕ) := FullSubcategory fun a : SimplexCategory => a.len ≤ n #align simplex_category.truncated SimplexCategory.Truncated instance (n : ℕ) : SmallCategory.{0} (Truncated n) := FullSubcategory.category _ section EpiMono theorem mono_iff_injective {n m : SimplexCategory} {f : n ⟶ m} : Mono f ↔ Function.Injective f.toOrderHom := by rw [← Functor.mono_map_iff_mono skeletalEquivalence.functor] dsimp only [skeletalEquivalence, Functor.asEquivalence_functor] simp only [skeletalFunctor_obj, skeletalFunctor_map, NonemptyFinLinOrd.mono_iff_injective, NonemptyFinLinOrd.coe_of] #align simplex_category.mono_iff_injective SimplexCategory.mono_iff_injective	Mathlib/AlgebraicTopology/SimplexCategory.lean	563	568	theorem epi_iff_surjective {n m : SimplexCategory} {f : n ⟶ m} : Epi f ↔ Function.Surjective f.toOrderHom := by	rw [← Functor.epi_map_iff_epi skeletalEquivalence.functor] dsimp only [skeletalEquivalence, Functor.asEquivalence_functor] simp only [skeletalFunctor_obj, skeletalFunctor_map, NonemptyFinLinOrd.epi_iff_surjective, NonemptyFinLinOrd.coe_of]
import Mathlib.Topology.Basic import Mathlib.Order.UpperLower.Basic import Mathlib.Order.OmegaCompletePartialOrder #align_import topology.omega_complete_partial_order from "leanprover-community/mathlib"@"2705404e701abc6b3127da906f40bae062a169c9" open Set OmegaCompletePartialOrder open scoped Classical universe u -- "Scott", "ωSup" set_option linter.uppercaseLean3 false abbrev Scott (α : Type u) := α #align Scott Scott instance Scott.topologicalSpace (α : Type u) [OmegaCompletePartialOrder α] : TopologicalSpace (Scott α) where IsOpen := Scott.IsOpen α isOpen_univ := Scott.isOpen_univ α isOpen_inter := Scott.IsOpen.inter α isOpen_sUnion := Scott.isOpen_sUnion α #align Scott.topological_space Scott.topologicalSpace open Scott hiding IsOpen open OmegaCompletePartialOrder	Mathlib/Topology/OmegaCompletePartialOrder.lean	110	113	theorem isωSup_ωSup {α} [OmegaCompletePartialOrder α] (c : Chain α) : IsωSup c (ωSup c) := by	constructor · apply le_ωSup · apply ωSup_le
import Mathlib.CategoryTheory.Equivalence #align_import category_theory.adjunction.basic from "leanprover-community/mathlib"@"d101e93197bb5f6ea89bd7ba386b7f7dff1f3903" namespace CategoryTheory open Category -- declare the `v`'s first; see `CategoryTheory.Category` for an explanation universe v₁ v₂ v₃ u₁ u₂ u₃ -- Porting Note: `elab_without_expected_type` cannot be a local attribute -- attribute [local elab_without_expected_type] whiskerLeft whiskerRight variable {C : Type u₁} [Category.{v₁} C] {D : Type u₂} [Category.{v₂} D] structure Adjunction (F : C ⥤ D) (G : D ⥤ C) where homEquiv : ∀ X Y, (F.obj X ⟶ Y) ≃ (X ⟶ G.obj Y) unit : 𝟭 C ⟶ F.comp G counit : G.comp F ⟶ 𝟭 D -- Porting note: It's strange that this `Prop` is being flagged by the `docBlame` linter homEquiv_unit : ∀ {X Y f}, (homEquiv X Y) f = (unit : _ ⟶ _).app X ≫ G.map f := by aesop_cat -- Porting note: It's strange that this `Prop` is being flagged by the `docBlame` linter homEquiv_counit : ∀ {X Y g}, (homEquiv X Y).symm g = F.map g ≫ counit.app Y := by aesop_cat #align category_theory.adjunction CategoryTheory.Adjunction #align category_theory.adjunction.hom_equiv CategoryTheory.Adjunction.homEquiv #align category_theory.adjunction.hom_equiv_unit CategoryTheory.Adjunction.homEquiv_unit #align category_theory.adjunction.hom_equiv_unit' CategoryTheory.Adjunction.homEquiv_unit #align category_theory.adjunction.hom_equiv_counit CategoryTheory.Adjunction.homEquiv_counit #align category_theory.adjunction.hom_equiv_counit' CategoryTheory.Adjunction.homEquiv_counit infixl:15 " ⊣ " => Adjunction noncomputable def Adjunction.ofIsLeftAdjoint (left : C ⥤ D) [left.IsLeftAdjoint] : left ⊣ left.rightAdjoint := Functor.IsLeftAdjoint.exists_rightAdjoint.choose_spec.some #align category_theory.adjunction.of_left_adjoint CategoryTheory.Adjunction.ofIsLeftAdjoint noncomputable def Adjunction.ofIsRightAdjoint (right : C ⥤ D) [right.IsRightAdjoint] : right.leftAdjoint ⊣ right := Functor.IsRightAdjoint.exists_leftAdjoint.choose_spec.some #align category_theory.adjunction.of_right_adjoint CategoryTheory.Adjunction.ofIsRightAdjoint namespace Adjunction -- Porting note: Workaround not needed in Lean 4 -- restate_axiom homEquiv_unit' -- restate_axiom homEquiv_counit' attribute [simp] homEquiv_unit homEquiv_counit section variable {F : C ⥤ D} {G : D ⥤ C} (adj : F ⊣ G) lemma isLeftAdjoint : F.IsLeftAdjoint := ⟨_, ⟨adj⟩⟩ lemma isRightAdjoint : G.IsRightAdjoint := ⟨_, ⟨adj⟩⟩ instance (R : D ⥤ C) [R.IsRightAdjoint] : R.leftAdjoint.IsLeftAdjoint := (ofIsRightAdjoint R).isLeftAdjoint instance (L : C ⥤ D) [L.IsLeftAdjoint] : L.rightAdjoint.IsRightAdjoint := (ofIsLeftAdjoint L).isRightAdjoint variable {X' X : C} {Y Y' : D} theorem homEquiv_id (X : C) : adj.homEquiv X _ (𝟙 _) = adj.unit.app X := by simp #align category_theory.adjunction.hom_equiv_id CategoryTheory.Adjunction.homEquiv_id theorem homEquiv_symm_id (X : D) : (adj.homEquiv _ X).symm (𝟙 _) = adj.counit.app X := by simp #align category_theory.adjunction.hom_equiv_symm_id CategoryTheory.Adjunction.homEquiv_symm_id @[simp, nolint simpNF] theorem homEquiv_naturality_left_symm (f : X' ⟶ X) (g : X ⟶ G.obj Y) : (adj.homEquiv X' Y).symm (f ≫ g) = F.map f ≫ (adj.homEquiv X Y).symm g := by rw [homEquiv_counit, F.map_comp, assoc, adj.homEquiv_counit.symm] #align category_theory.adjunction.hom_equiv_naturality_left_symm CategoryTheory.Adjunction.homEquiv_naturality_left_symm -- Porting note: Same as above @[simp, nolint simpNF] theorem homEquiv_naturality_left (f : X' ⟶ X) (g : F.obj X ⟶ Y) : (adj.homEquiv X' Y) (F.map f ≫ g) = f ≫ (adj.homEquiv X Y) g := by rw [← Equiv.eq_symm_apply] simp only [Equiv.symm_apply_apply,eq_self_iff_true,homEquiv_naturality_left_symm] #align category_theory.adjunction.hom_equiv_naturality_left CategoryTheory.Adjunction.homEquiv_naturality_left -- Porting note: Same as above @[simp, nolint simpNF] theorem homEquiv_naturality_right (f : F.obj X ⟶ Y) (g : Y ⟶ Y') : (adj.homEquiv X Y') (f ≫ g) = (adj.homEquiv X Y) f ≫ G.map g := by rw [homEquiv_unit, G.map_comp, ← assoc, ← homEquiv_unit] #align category_theory.adjunction.hom_equiv_naturality_right CategoryTheory.Adjunction.homEquiv_naturality_right -- Porting note: Same as above @[simp, nolint simpNF] theorem homEquiv_naturality_right_symm (f : X ⟶ G.obj Y) (g : Y ⟶ Y') : (adj.homEquiv X Y').symm (f ≫ G.map g) = (adj.homEquiv X Y).symm f ≫ g := by rw [Equiv.symm_apply_eq] simp only [homEquiv_naturality_right,eq_self_iff_true,Equiv.apply_symm_apply] #align category_theory.adjunction.hom_equiv_naturality_right_symm CategoryTheory.Adjunction.homEquiv_naturality_right_symm @[reassoc] theorem homEquiv_naturality_left_square (f : X' ⟶ X) (g : F.obj X ⟶ Y') (h : F.obj X' ⟶ Y) (k : Y ⟶ Y') (w : F.map f ≫ g = h ≫ k) : f ≫ (adj.homEquiv X Y') g = (adj.homEquiv X' Y) h ≫ G.map k := by rw [← homEquiv_naturality_left, ← homEquiv_naturality_right, w] @[reassoc] theorem homEquiv_naturality_right_square (f : X' ⟶ X) (g : X ⟶ G.obj Y') (h : X' ⟶ G.obj Y) (k : Y ⟶ Y') (w : f ≫ g = h ≫ G.map k) : F.map f ≫ (adj.homEquiv X Y').symm g = (adj.homEquiv X' Y).symm h ≫ k := by rw [← homEquiv_naturality_left_symm, ← homEquiv_naturality_right_symm, w] theorem homEquiv_naturality_left_square_iff (f : X' ⟶ X) (g : F.obj X ⟶ Y') (h : F.obj X' ⟶ Y) (k : Y ⟶ Y') : (f ≫ (adj.homEquiv X Y') g = (adj.homEquiv X' Y) h ≫ G.map k) ↔ (F.map f ≫ g = h ≫ k) := ⟨fun w ↦ by simpa only [Equiv.symm_apply_apply] using homEquiv_naturality_right_square adj _ _ _ _ w, homEquiv_naturality_left_square adj f g h k⟩ theorem homEquiv_naturality_right_square_iff (f : X' ⟶ X) (g : X ⟶ G.obj Y') (h : X' ⟶ G.obj Y) (k : Y ⟶ Y') : (F.map f ≫ (adj.homEquiv X Y').symm g = (adj.homEquiv X' Y).symm h ≫ k) ↔ (f ≫ g = h ≫ G.map k) := ⟨fun w ↦ by simpa only [Equiv.apply_symm_apply] using homEquiv_naturality_left_square adj _ _ _ _ w, homEquiv_naturality_right_square adj f g h k⟩ @[simp] theorem left_triangle : whiskerRight adj.unit F ≫ whiskerLeft F adj.counit = 𝟙 _ := by ext; dsimp erw [← adj.homEquiv_counit, Equiv.symm_apply_eq, adj.homEquiv_unit] simp #align category_theory.adjunction.left_triangle CategoryTheory.Adjunction.left_triangle @[simp]	Mathlib/CategoryTheory/Adjunction/Basic.lean	221	224	theorem right_triangle : whiskerLeft G adj.unit ≫ whiskerRight adj.counit G = 𝟙 _ := by	ext; dsimp erw [← adj.homEquiv_unit, ← Equiv.eq_symm_apply, adj.homEquiv_counit] simp
import Mathlib.Combinatorics.SimpleGraph.Basic import Mathlib.Combinatorics.SimpleGraph.Connectivity import Mathlib.LinearAlgebra.Matrix.Trace import Mathlib.LinearAlgebra.Matrix.Symmetric #align_import combinatorics.simple_graph.adj_matrix from "leanprover-community/mathlib"@"3e068ece210655b7b9a9477c3aff38a492400aa1" open Matrix open Finset Matrix SimpleGraph variable {V α β : Type} namespace Matrix structure IsAdjMatrix [Zero α] [One α] (A : Matrix V V α) : Prop where zero_or_one : ∀ i j, A i j = 0 ∨ A i j = 1 := by aesop symm : A.IsSymm := by aesop apply_diag : ∀ i, A i i = 0 := by aesop #align matrix.is_adj_matrix Matrix.IsAdjMatrix open Matrix namespace SimpleGraph variable (G : SimpleGraph V) [DecidableRel G.Adj] variable (α) def adjMatrix [Zero α] [One α] : Matrix V V α := of fun i j => if G.Adj i j then (1 : α) else 0 #align simple_graph.adj_matrix SimpleGraph.adjMatrix variable {α} -- TODO: set as an equation lemma for `adjMatrix`, see mathlib4#3024 @[simp] theorem adjMatrix_apply (v w : V) [Zero α] [One α] : G.adjMatrix α v w = if G.Adj v w then 1 else 0 := rfl #align simple_graph.adj_matrix_apply SimpleGraph.adjMatrix_apply @[simp] theorem transpose_adjMatrix [Zero α] [One α] : (G.adjMatrix α)ᵀ = G.adjMatrix α := by ext simp [adj_comm] #align simple_graph.transpose_adj_matrix SimpleGraph.transpose_adjMatrix @[simp] theorem isSymm_adjMatrix [Zero α] [One α] : (G.adjMatrix α).IsSymm := transpose_adjMatrix G #align simple_graph.is_symm_adj_matrix SimpleGraph.isSymm_adjMatrix variable (α) @[simp] theorem isAdjMatrix_adjMatrix [Zero α] [One α] : (G.adjMatrix α).IsAdjMatrix := { zero_or_one := fun i j => by by_cases h : G.Adj i j <;> simp [h] } #align simple_graph.is_adj_matrix_adj_matrix SimpleGraph.isAdjMatrix_adjMatrix theorem toGraph_adjMatrix_eq [MulZeroOneClass α] [Nontrivial α] : (G.isAdjMatrix_adjMatrix α).toGraph = G := by ext simp only [IsAdjMatrix.toGraph_adj, adjMatrix_apply, ite_eq_left_iff, zero_ne_one] apply Classical.not_not #align simple_graph.to_graph_adj_matrix_eq SimpleGraph.toGraph_adjMatrix_eq variable {α} [Fintype V] @[simp] theorem adjMatrix_dotProduct [NonAssocSemiring α] (v : V) (vec : V → α) : dotProduct (G.adjMatrix α v) vec = ∑ u ∈ G.neighborFinset v, vec u := by simp [neighborFinset_eq_filter, dotProduct, sum_filter] #align simple_graph.adj_matrix_dot_product SimpleGraph.adjMatrix_dotProduct @[simp] theorem dotProduct_adjMatrix [NonAssocSemiring α] (v : V) (vec : V → α) : dotProduct vec (G.adjMatrix α v) = ∑ u ∈ G.neighborFinset v, vec u := by simp [neighborFinset_eq_filter, dotProduct, sum_filter, Finset.sum_apply] #align simple_graph.dot_product_adj_matrix SimpleGraph.dotProduct_adjMatrix @[simp] theorem adjMatrix_mulVec_apply [NonAssocSemiring α] (v : V) (vec : V → α) : (G.adjMatrix α ᵥ vec) v = ∑ u ∈ G.neighborFinset v, vec u := by rw [mulVec, adjMatrix_dotProduct] #align simple_graph.adj_matrix_mul_vec_apply SimpleGraph.adjMatrix_mulVec_apply @[simp] theorem adjMatrix_vecMul_apply [NonAssocSemiring α] (v : V) (vec : V → α) : (vec ᵥ* G.adjMatrix α) v = ∑ u ∈ G.neighborFinset v, vec u := by simp only [← dotProduct_adjMatrix, vecMul] refine congr rfl ?_; ext x rw [← transpose_apply (adjMatrix α G) x v, transpose_adjMatrix] #align simple_graph.adj_matrix_vec_mul_apply SimpleGraph.adjMatrix_vecMul_apply @[simp] theorem adjMatrix_mul_apply [NonAssocSemiring α] (M : Matrix V V α) (v w : V) : (G.adjMatrix α * M) v w = ∑ u ∈ G.neighborFinset v, M u w := by simp [mul_apply, neighborFinset_eq_filter, sum_filter] #align simple_graph.adj_matrix_mul_apply SimpleGraph.adjMatrix_mul_apply @[simp] theorem mul_adjMatrix_apply [NonAssocSemiring α] (M : Matrix V V α) (v w : V) : (M * G.adjMatrix α) v w = ∑ u ∈ G.neighborFinset w, M v u := by simp [mul_apply, neighborFinset_eq_filter, sum_filter, adj_comm] #align simple_graph.mul_adj_matrix_apply SimpleGraph.mul_adjMatrix_apply variable (α) @[simp] theorem trace_adjMatrix [AddCommMonoid α] [One α] : Matrix.trace (G.adjMatrix α) = 0 := by simp [Matrix.trace] #align simple_graph.trace_adj_matrix SimpleGraph.trace_adjMatrix variable {α}	Mathlib/Combinatorics/SimpleGraph/AdjMatrix.lean	244	245	theorem adjMatrix_mul_self_apply_self [NonAssocSemiring α] (i : V) : (G.adjMatrix α * G.adjMatrix α) i i = degree G i := by	simp [filter_true_of_mem]
import Mathlib.Algebra.Algebra.Bilinear import Mathlib.RingTheory.Localization.Basic #align_import algebra.module.localized_module from "leanprover-community/mathlib"@"831c494092374cfe9f50591ed0ac81a25efc5b86" section IsLocalizedModule universe u v variable {R : Type} [CommSemiring R] (S : Submonoid R) variable {M M' M'' : Type} [AddCommMonoid M] [AddCommMonoid M'] [AddCommMonoid M''] variable {A : Type} [CommSemiring A] [Algebra R A] [Module A M'] [IsLocalization S A] variable [Module R M] [Module R M'] [Module R M''] [IsScalarTower R A M'] variable (f : M →ₗ[R] M') (g : M →ₗ[R] M'') @[mk_iff] class IsLocalizedModule : Prop where map_units : ∀ x : S, IsUnit (algebraMap R (Module.End R M') x) surj' : ∀ y : M', ∃ x : M × S, x.2 • y = f x.1 exists_of_eq : ∀ {x₁ x₂}, f x₁ = f x₂ → ∃ c : S, c • x₁ = c • x₂ #align is_localized_module IsLocalizedModule attribute [nolint docBlame] IsLocalizedModule.map_units IsLocalizedModule.surj' IsLocalizedModule.exists_of_eq -- Porting note: Manually added to make `S` and `f` explicit. lemma IsLocalizedModule.surj [IsLocalizedModule S f] (y : M') : ∃ x : M × S, x.2 • y = f x.1 := surj' y -- Porting note: Manually added to make `S` and `f` explicit. lemma IsLocalizedModule.eq_iff_exists [IsLocalizedModule S f] {x₁ x₂} : f x₁ = f x₂ ↔ ∃ c : S, c • x₁ = c • x₂ := Iff.intro exists_of_eq fun ⟨c, h⟩ ↦ by apply_fun f at h simp_rw [f.map_smul_of_tower, Submonoid.smul_def, ← Module.algebraMap_end_apply R R] at h exact ((Module.End_isUnit_iff _).mp <\| map_units f c).1 h theorem IsLocalizedModule.of_linearEquiv (e : M' ≃ₗ[R] M'') [hf : IsLocalizedModule S f] : IsLocalizedModule S (e ∘ₗ f : M →ₗ[R] M'') where map_units s := by rw [show algebraMap R (Module.End R M'') s = e ∘ₗ (algebraMap R (Module.End R M') s) ∘ₗ e.symm by ext; simp, Module.End_isUnit_iff, LinearMap.coe_comp, LinearMap.coe_comp, LinearEquiv.coe_coe, LinearEquiv.coe_coe, EquivLike.comp_bijective, EquivLike.bijective_comp] exact (Module.End_isUnit_iff _).mp <\| hf.map_units s surj' x := by obtain ⟨p, h⟩ := hf.surj' (e.symm x) exact ⟨p, by rw [LinearMap.coe_comp, LinearEquiv.coe_coe, Function.comp_apply, ← e.congr_arg h, Submonoid.smul_def, Submonoid.smul_def, LinearEquiv.map_smul, LinearEquiv.apply_symm_apply]⟩ exists_of_eq h := by simp_rw [LinearMap.coe_comp, LinearEquiv.coe_coe, Function.comp_apply, EmbeddingLike.apply_eq_iff_eq] at h exact hf.exists_of_eq h variable (M) in lemma isLocalizedModule_id (R') [CommSemiring R'] [Algebra R R'] [IsLocalization S R'] [Module R' M] [IsScalarTower R R' M] : IsLocalizedModule S (.id : M →ₗ[R] M) where map_units s := by rw [← (Algebra.lsmul R (A := R') R M).commutes]; exact (IsLocalization.map_units R' s).map _ surj' m := ⟨(m, 1), one_smul _ _⟩ exists_of_eq h := ⟨1, congr_arg _ h⟩ variable {S} in theorem isLocalizedModule_iff_isLocalization {A Aₛ} [CommSemiring A] [Algebra R A] [CommSemiring Aₛ] [Algebra A Aₛ] [Algebra R Aₛ] [IsScalarTower R A Aₛ] : IsLocalizedModule S (IsScalarTower.toAlgHom R A Aₛ).toLinearMap ↔ IsLocalization (Algebra.algebraMapSubmonoid A S) Aₛ := by rw [isLocalizedModule_iff, isLocalization_iff] refine and_congr ?_ (and_congr (forall_congr' fun _ ↦ ?_) (forall₂_congr fun _ _ ↦ ?_)) · simp_rw [← (Algebra.lmul R Aₛ).commutes, Algebra.lmul_isUnit_iff, Subtype.forall, Algebra.algebraMapSubmonoid, ← SetLike.mem_coe, Submonoid.coe_map, Set.forall_mem_image, ← IsScalarTower.algebraMap_apply] · simp_rw [Prod.exists, Subtype.exists, Algebra.algebraMapSubmonoid] simp [← IsScalarTower.algebraMap_apply, Submonoid.mk_smul, Algebra.smul_def, mul_comm] · congr!; simp_rw [Subtype.exists, Algebra.algebraMapSubmonoid]; simp [Algebra.smul_def] instance {A Aₛ} [CommSemiring A] [Algebra R A][CommSemiring Aₛ] [Algebra A Aₛ] [Algebra R Aₛ] [IsScalarTower R A Aₛ] [h : IsLocalization (Algebra.algebraMapSubmonoid A S) Aₛ] : IsLocalizedModule S (IsScalarTower.toAlgHom R A Aₛ).toLinearMap := isLocalizedModule_iff_isLocalization.mpr h lemma isLocalizedModule_iff_isLocalization' (R') [CommSemiring R'] [Algebra R R'] : IsLocalizedModule S (Algebra.ofId R R').toLinearMap ↔ IsLocalization S R' := by convert isLocalizedModule_iff_isLocalization (S := S) (A := R) (Aₛ := R') exact (Submonoid.map_id S).symm namespace LocalizedModule noncomputable def lift' (g : M →ₗ[R] M'') (h : ∀ x : S, IsUnit (algebraMap R (Module.End R M'') x)) : LocalizedModule S M → M'' := fun m => m.liftOn (fun p => (h p.2).unit⁻¹.val <\| g p.1) fun ⟨m, s⟩ ⟨m', s'⟩ ⟨c, eq1⟩ => by -- Porting note: We remove `generalize_proofs h1 h2`. This does nothing here. dsimp only simp only [Submonoid.smul_def] at eq1 rw [Module.End_algebraMap_isUnit_inv_apply_eq_iff, ← map_smul, eq_comm, Module.End_algebraMap_isUnit_inv_apply_eq_iff] have : c • s • g m' = c • s' • g m := by simp only [Submonoid.smul_def, ← g.map_smul, eq1] have : Function.Injective (h c).unit.inv := by rw [Function.injective_iff_hasLeftInverse] refine ⟨(h c).unit, ?_⟩ intro x change ((h c).unit.1 (h c).unit.inv) x = x simp only [Units.inv_eq_val_inv, IsUnit.mul_val_inv, LinearMap.one_apply] apply_fun (h c).unit.inv erw [Units.inv_eq_val_inv, Module.End_algebraMap_isUnit_inv_apply_eq_iff, ← (h c).unit⁻¹.val.map_smul] symm rw [Module.End_algebraMap_isUnit_inv_apply_eq_iff, ← g.map_smul, ← g.map_smul, ← g.map_smul, ← g.map_smul, eq1] #align localized_module.lift' LocalizedModule.lift' theorem lift'_mk (g : M →ₗ[R] M'') (h : ∀ x : S, IsUnit ((algebraMap R (Module.End R M'')) x)) (m : M) (s : S) : LocalizedModule.lift' S g h (LocalizedModule.mk m s) = (h s).unit⁻¹.val (g m) := rfl #align localized_module.lift'_mk LocalizedModule.lift'_mk theorem lift'_add (g : M →ₗ[R] M'') (h : ∀ x : S, IsUnit ((algebraMap R (Module.End R M'')) x)) (x y) : LocalizedModule.lift' S g h (x + y) = LocalizedModule.lift' S g h x + LocalizedModule.lift' S g h y := LocalizedModule.induction_on₂ (by intro a a' b b' erw [LocalizedModule.lift'_mk, LocalizedModule.lift'_mk, LocalizedModule.lift'_mk] -- Porting note: We remove `generalize_proofs h1 h2 h3`. This only generalize `h1`. erw [map_add, Module.End_algebraMap_isUnit_inv_apply_eq_iff, smul_add, ← map_smul, ← map_smul, ← map_smul] congr 1 <;> symm · erw [Module.End_algebraMap_isUnit_inv_apply_eq_iff, mul_smul, ← map_smul] rfl · dsimp erw [Module.End_algebraMap_isUnit_inv_apply_eq_iff, mul_comm, mul_smul, ← map_smul] rfl) x y #align localized_module.lift'_add LocalizedModule.lift'_add theorem lift'_smul (g : M →ₗ[R] M'') (h : ∀ x : S, IsUnit ((algebraMap R (Module.End R M'')) x)) (r : R) (m) : r • LocalizedModule.lift' S g h m = LocalizedModule.lift' S g h (r • m) := m.induction_on fun a b => by rw [LocalizedModule.lift'_mk, LocalizedModule.smul'_mk, LocalizedModule.lift'_mk] -- Porting note: We remove `generalize_proofs h1 h2`. This does nothing here. rw [← map_smul, ← g.map_smul] #align localized_module.lift'_smul LocalizedModule.lift'_smul noncomputable def lift (g : M →ₗ[R] M'') (h : ∀ x : S, IsUnit ((algebraMap R (Module.End R M'')) x)) : LocalizedModule S M →ₗ[R] M'' where toFun := LocalizedModule.lift' S g h map_add' := LocalizedModule.lift'_add S g h map_smul' r x := by rw [LocalizedModule.lift'_smul, RingHom.id_apply] #align localized_module.lift LocalizedModule.lift theorem lift_mk (g : M →ₗ[R] M'') (h : ∀ x : S, IsUnit (algebraMap R (Module.End R M'') x)) (m : M) (s : S) : LocalizedModule.lift S g h (LocalizedModule.mk m s) = (h s).unit⁻¹.val (g m) := rfl #align localized_module.lift_mk LocalizedModule.lift_mk	Mathlib/Algebra/Module/LocalizedModule.lean	713	716	theorem lift_comp (g : M →ₗ[R] M'') (h : ∀ x : S, IsUnit ((algebraMap R (Module.End R M'')) x)) : (lift S g h).comp (mkLinearMap S M) = g := by	ext x; dsimp; rw [LocalizedModule.lift_mk] erw [Module.End_algebraMap_isUnit_inv_apply_eq_iff, one_smul]
import Mathlib.Analysis.InnerProductSpace.PiL2 import Mathlib.Combinatorics.Additive.AP.Three.Defs import Mathlib.Combinatorics.Pigeonhole import Mathlib.Data.Complex.ExponentialBounds #align_import combinatorics.additive.behrend from "leanprover-community/mathlib"@"4fa54b337f7d52805480306db1b1439c741848c8" open Nat hiding log open Finset Metric Real open scoped Pointwise lemma threeAPFree_frontier {𝕜 E : Type} [LinearOrderedField 𝕜] [TopologicalSpace E] [AddCommMonoid E] [Module 𝕜 E] {s : Set E} (hs₀ : IsClosed s) (hs₁ : StrictConvex 𝕜 s) : ThreeAPFree (frontier s) := by intro a ha b hb c hc habc obtain rfl : (1 / 2 : 𝕜) • a + (1 / 2 : 𝕜) • c = b := by rwa [← smul_add, one_div, inv_smul_eq_iff₀ (show (2 : 𝕜) ≠ 0 by norm_num), two_smul] have := hs₁.eq (hs₀.frontier_subset ha) (hs₀.frontier_subset hc) one_half_pos one_half_pos (add_halves _) hb.2 simp [this, ← add_smul] ring_nf simp #align add_salem_spencer_frontier threeAPFree_frontier lemma threeAPFree_sphere {E : Type} [NormedAddCommGroup E] [NormedSpace ℝ E] [StrictConvexSpace ℝ E] (x : E) (r : ℝ) : ThreeAPFree (sphere x r) := by obtain rfl \| hr := eq_or_ne r 0 · rw [sphere_zero] exact threeAPFree_singleton _ · convert threeAPFree_frontier isClosed_ball (strictConvex_closedBall ℝ x r) exact (frontier_closedBall _ hr).symm #align add_salem_spencer_sphere threeAPFree_sphere namespace Behrend variable {α β : Type*} {n d k N : ℕ} {x : Fin n → ℕ} def box (n d : ℕ) : Finset (Fin n → ℕ) := Fintype.piFinset fun _ => range d #align behrend.box Behrend.box theorem mem_box : x ∈ box n d ↔ ∀ i, x i < d := by simp only [box, Fintype.mem_piFinset, mem_range] #align behrend.mem_box Behrend.mem_box @[simp] theorem card_box : (box n d).card = d ^ n := by simp [box] #align behrend.card_box Behrend.card_box @[simp] theorem box_zero : box (n + 1) 0 = ∅ := by simp [box] #align behrend.box_zero Behrend.box_zero def sphere (n d k : ℕ) : Finset (Fin n → ℕ) := (box n d).filter fun x => ∑ i, x i ^ 2 = k #align behrend.sphere Behrend.sphere theorem sphere_zero_subset : sphere n d 0 ⊆ 0 := fun x => by simp [sphere, Function.funext_iff] #align behrend.sphere_zero_subset Behrend.sphere_zero_subset @[simp]	Mathlib/Combinatorics/Additive/AP/Three/Behrend.lean	118	118	theorem sphere_zero_right (n k : ℕ) : sphere (n + 1) 0 k = ∅ := by	simp [sphere]
import Mathlib.LinearAlgebra.FiniteDimensional import Mathlib.RingTheory.IntegralClosure import Mathlib.RingTheory.Polynomial.IntegralNormalization #align_import ring_theory.algebraic from "leanprover-community/mathlib"@"2196ab363eb097c008d4497125e0dde23fb36db2" universe u v w open scoped Classical open Polynomial section variable (R : Type u) {A : Type v} [CommRing R] [Ring A] [Algebra R A] def IsAlgebraic (x : A) : Prop := ∃ p : R[X], p ≠ 0 ∧ aeval x p = 0 #align is_algebraic IsAlgebraic def Transcendental (x : A) : Prop := ¬IsAlgebraic R x #align transcendental Transcendental theorem is_transcendental_of_subsingleton [Subsingleton R] (x : A) : Transcendental R x := fun ⟨p, h, _⟩ => h <\| Subsingleton.elim p 0 #align is_transcendental_of_subsingleton is_transcendental_of_subsingleton variable {R} nonrec def Subalgebra.IsAlgebraic (S : Subalgebra R A) : Prop := ∀ x ∈ S, IsAlgebraic R x #align subalgebra.is_algebraic Subalgebra.IsAlgebraic variable (R A) protected class Algebra.IsAlgebraic : Prop := isAlgebraic : ∀ x : A, IsAlgebraic R x #align algebra.is_algebraic Algebra.IsAlgebraic variable {R A} lemma Algebra.isAlgebraic_def : Algebra.IsAlgebraic R A ↔ ∀ x : A, IsAlgebraic R x := ⟨fun ⟨h⟩ ↦ h, fun h ↦ ⟨h⟩⟩ theorem Subalgebra.isAlgebraic_iff (S : Subalgebra R A) : S.IsAlgebraic ↔ @Algebra.IsAlgebraic R S _ _ S.algebra := by delta Subalgebra.IsAlgebraic rw [Subtype.forall', Algebra.isAlgebraic_def] refine forall_congr' fun x => exists_congr fun p => and_congr Iff.rfl ?_ have h : Function.Injective S.val := Subtype.val_injective conv_rhs => rw [← h.eq_iff, AlgHom.map_zero] rw [← aeval_algHom_apply, S.val_apply] #align subalgebra.is_algebraic_iff Subalgebra.isAlgebraic_iff theorem Algebra.isAlgebraic_iff : Algebra.IsAlgebraic R A ↔ (⊤ : Subalgebra R A).IsAlgebraic := by delta Subalgebra.IsAlgebraic simp only [Algebra.isAlgebraic_def, Algebra.mem_top, forall_prop_of_true, iff_self_iff] #align algebra.is_algebraic_iff Algebra.isAlgebraic_iff theorem isAlgebraic_iff_not_injective {x : A} : IsAlgebraic R x ↔ ¬Function.Injective (Polynomial.aeval x : R[X] →ₐ[R] A) := by simp only [IsAlgebraic, injective_iff_map_eq_zero, not_forall, and_comm, exists_prop] #align is_algebraic_iff_not_injective isAlgebraic_iff_not_injective end section variable {K L R S A : Type} section Ring section NoZeroSMulDivisors end variable {R S : Type} [CommRing R] [IsDomain R] [CommRing S] theorem exists_integral_multiple [Algebra R S] {z : S} (hz : IsAlgebraic R z) (inj : ∀ x, algebraMap R S x = 0 → x = 0) : ∃ᵉ (x : integralClosure R S) (y ≠ (0 : R)), z * algebraMap R S y = x := by rcases hz with ⟨p, p_ne_zero, px⟩ set a := p.leadingCoeff have a_ne_zero : a ≠ 0 := mt Polynomial.leadingCoeff_eq_zero.mp p_ne_zero have x_integral : IsIntegral R (z * algebraMap R S a) := ⟨p.integralNormalization, monic_integralNormalization p_ne_zero, integralNormalization_aeval_eq_zero px inj⟩ exact ⟨⟨_, x_integral⟩, a, a_ne_zero, rfl⟩ #align exists_integral_multiple exists_integral_multiple	Mathlib/RingTheory/Algebraic.lean	411	423	theorem IsIntegralClosure.exists_smul_eq_mul {L : Type} [Field L] [Algebra R S] [Algebra S L] [Algebra R L] [IsScalarTower R S L] [IsIntegralClosure S R L] [Algebra.IsAlgebraic R L] (inj : Function.Injective (algebraMap R L)) (a : S) {b : S} (hb : b ≠ 0) : ∃ᵉ (c : S) (d ≠ (0 : R)), d • a = b c := by	obtain ⟨c, d, d_ne, hx⟩ := exists_integral_multiple (Algebra.IsAlgebraic.isAlgebraic (algebraMap _ L a / algebraMap _ L b)) ((injective_iff_map_eq_zero _).mp inj) refine ⟨IsIntegralClosure.mk' S (c : L) c.2, d, d_ne, IsIntegralClosure.algebraMap_injective S R L ?_⟩ simp only [Algebra.smul_def, RingHom.map_mul, IsIntegralClosure.algebraMap_mk', ← hx, ← IsScalarTower.algebraMap_apply] rw [← mul_assoc _ (_ / _), mul_div_cancel₀ (algebraMap S L a), mul_comm] exact mt ((injective_iff_map_eq_zero _).mp (IsIntegralClosure.algebraMap_injective S R L) _) hb
import Mathlib.Order.Interval.Set.UnorderedInterval import Mathlib.Algebra.Order.Interval.Set.Monoid import Mathlib.Data.Set.Pointwise.Basic import Mathlib.Algebra.Order.Field.Basic import Mathlib.Algebra.Order.Group.MinMax #align_import data.set.pointwise.interval from "leanprover-community/mathlib"@"2196ab363eb097c008d4497125e0dde23fb36db2" open Interval Pointwise variable {α : Type*} namespace Set section LinearOrderedAddCommGroup variable [LinearOrderedAddCommGroup α] (a b c d : α) @[simp] theorem preimage_const_add_uIcc : (fun x => a + x) ⁻¹' [[b, c]] = [[b - a, c - a]] := by simp only [← Icc_min_max, preimage_const_add_Icc, min_sub_sub_right, max_sub_sub_right] #align set.preimage_const_add_uIcc Set.preimage_const_add_uIcc @[simp] theorem preimage_add_const_uIcc : (fun x => x + a) ⁻¹' [[b, c]] = [[b - a, c - a]] := by simpa only [add_comm] using preimage_const_add_uIcc a b c #align set.preimage_add_const_uIcc Set.preimage_add_const_uIcc -- TODO: Why is the notation `-[[a, b]]` broken? @[simp] theorem preimage_neg_uIcc : @Neg.neg (Set α) Set.neg [[a, b]] = [[-a, -b]] := by simp only [← Icc_min_max, preimage_neg_Icc, min_neg_neg, max_neg_neg] #align set.preimage_neg_uIcc Set.preimage_neg_uIcc @[simp] theorem preimage_sub_const_uIcc : (fun x => x - a) ⁻¹' [[b, c]] = [[b + a, c + a]] := by simp [sub_eq_add_neg] #align set.preimage_sub_const_uIcc Set.preimage_sub_const_uIcc @[simp] theorem preimage_const_sub_uIcc : (fun x => a - x) ⁻¹' [[b, c]] = [[a - b, a - c]] := by simp_rw [← Icc_min_max, preimage_const_sub_Icc] simp only [sub_eq_add_neg, min_add_add_left, max_add_add_left, min_neg_neg, max_neg_neg] #align set.preimage_const_sub_uIcc Set.preimage_const_sub_uIcc -- @[simp] -- Porting note (#10618): simp can prove this module `add_comm` theorem image_const_add_uIcc : (fun x => a + x) '' [[b, c]] = [[a + b, a + c]] := by simp [add_comm] #align set.image_const_add_uIcc Set.image_const_add_uIcc -- @[simp] -- Porting note (#10618): simp can prove this theorem image_add_const_uIcc : (fun x => x + a) '' [[b, c]] = [[b + a, c + a]] := by simp #align set.image_add_const_uIcc Set.image_add_const_uIcc @[simp] theorem image_const_sub_uIcc : (fun x => a - x) '' [[b, c]] = [[a - b, a - c]] := by have := image_comp (fun x => a + x) fun x => -x; dsimp [Function.comp_def] at this simp [sub_eq_add_neg, this, add_comm] #align set.image_const_sub_uIcc Set.image_const_sub_uIcc @[simp] theorem image_sub_const_uIcc : (fun x => x - a) '' [[b, c]] = [[b - a, c - a]] := by simp [sub_eq_add_neg, add_comm] #align set.image_sub_const_uIcc Set.image_sub_const_uIcc theorem image_neg_uIcc : Neg.neg '' [[a, b]] = [[-a, -b]] := by simp #align set.image_neg_uIcc Set.image_neg_uIcc variable {a b c d}	Mathlib/Data/Set/Pointwise/Interval.lean	565	568	theorem abs_sub_le_of_uIcc_subset_uIcc (h : [[c, d]] ⊆ [[a, b]]) : \|d - c\| ≤ \|b - a\| := by	rw [← max_sub_min_eq_abs, ← max_sub_min_eq_abs] rw [uIcc_subset_uIcc_iff_le] at h exact sub_le_sub h.2 h.1
import Mathlib.Probability.Variance #align_import probability.moments from "leanprover-community/mathlib"@"85453a2a14be8da64caf15ca50930cf4c6e5d8de" open MeasureTheory Filter Finset Real noncomputable section open scoped MeasureTheory ProbabilityTheory ENNReal NNReal namespace ProbabilityTheory variable {Ω ι : Type} {m : MeasurableSpace Ω} {X : Ω → ℝ} {p : ℕ} {μ : Measure Ω} def moment (X : Ω → ℝ) (p : ℕ) (μ : Measure Ω) : ℝ := μ[X ^ p] #align probability_theory.moment ProbabilityTheory.moment def centralMoment (X : Ω → ℝ) (p : ℕ) (μ : Measure Ω) : ℝ := by have m := fun (x : Ω) => μ[X] -- Porting note: Lean deems `μ[(X - fun x => μ[X]) ^ p]` ambiguous exact μ[(X - m) ^ p] #align probability_theory.central_moment ProbabilityTheory.centralMoment @[simp] theorem moment_zero (hp : p ≠ 0) : moment 0 p μ = 0 := by simp only [moment, hp, zero_pow, Ne, not_false_iff, Pi.zero_apply, integral_const, smul_eq_mul, mul_zero, integral_zero] #align probability_theory.moment_zero ProbabilityTheory.moment_zero @[simp] theorem centralMoment_zero (hp : p ≠ 0) : centralMoment 0 p μ = 0 := by simp only [centralMoment, hp, Pi.zero_apply, integral_const, smul_eq_mul, mul_zero, zero_sub, Pi.pow_apply, Pi.neg_apply, neg_zero, zero_pow, Ne, not_false_iff] #align probability_theory.central_moment_zero ProbabilityTheory.centralMoment_zero theorem centralMoment_one' [IsFiniteMeasure μ] (h_int : Integrable X μ) : centralMoment X 1 μ = (1 - (μ Set.univ).toReal) μ[X] := by simp only [centralMoment, Pi.sub_apply, pow_one] rw [integral_sub h_int (integrable_const _)] simp only [sub_mul, integral_const, smul_eq_mul, one_mul] #align probability_theory.central_moment_one' ProbabilityTheory.centralMoment_one' @[simp] theorem centralMoment_one [IsProbabilityMeasure μ] : centralMoment X 1 μ = 0 := by by_cases h_int : Integrable X μ · rw [centralMoment_one' h_int] simp only [measure_univ, ENNReal.one_toReal, sub_self, zero_mul] · simp only [centralMoment, Pi.sub_apply, pow_one] have : ¬Integrable (fun x => X x - integral μ X) μ := by refine fun h_sub => h_int ?_ have h_add : X = (fun x => X x - integral μ X) + fun _ => integral μ X := by ext1 x; simp rw [h_add] exact h_sub.add (integrable_const _) rw [integral_undef this] #align probability_theory.central_moment_one ProbabilityTheory.centralMoment_one theorem centralMoment_two_eq_variance [IsFiniteMeasure μ] (hX : Memℒp X 2 μ) : centralMoment X 2 μ = variance X μ := by rw [hX.variance_eq]; rfl #align probability_theory.central_moment_two_eq_variance ProbabilityTheory.centralMoment_two_eq_variance section MomentGeneratingFunction variable {t : ℝ} def mgf (X : Ω → ℝ) (μ : Measure Ω) (t : ℝ) : ℝ := μ[fun ω => exp (t * X ω)] #align probability_theory.mgf ProbabilityTheory.mgf def cgf (X : Ω → ℝ) (μ : Measure Ω) (t : ℝ) : ℝ := log (mgf X μ t) #align probability_theory.cgf ProbabilityTheory.cgf @[simp] theorem mgf_zero_fun : mgf 0 μ t = (μ Set.univ).toReal := by simp only [mgf, Pi.zero_apply, mul_zero, exp_zero, integral_const, smul_eq_mul, mul_one] #align probability_theory.mgf_zero_fun ProbabilityTheory.mgf_zero_fun @[simp] theorem cgf_zero_fun : cgf 0 μ t = log (μ Set.univ).toReal := by simp only [cgf, mgf_zero_fun] #align probability_theory.cgf_zero_fun ProbabilityTheory.cgf_zero_fun @[simp] theorem mgf_zero_measure : mgf X (0 : Measure Ω) t = 0 := by simp only [mgf, integral_zero_measure] #align probability_theory.mgf_zero_measure ProbabilityTheory.mgf_zero_measure @[simp] theorem cgf_zero_measure : cgf X (0 : Measure Ω) t = 0 := by simp only [cgf, log_zero, mgf_zero_measure] #align probability_theory.cgf_zero_measure ProbabilityTheory.cgf_zero_measure @[simp] theorem mgf_const' (c : ℝ) : mgf (fun _ => c) μ t = (μ Set.univ).toReal * exp (t * c) := by simp only [mgf, integral_const, smul_eq_mul] #align probability_theory.mgf_const' ProbabilityTheory.mgf_const' -- @[simp] -- Porting note: `simp only` already proves this theorem mgf_const (c : ℝ) [IsProbabilityMeasure μ] : mgf (fun _ => c) μ t = exp (t * c) := by simp only [mgf_const', measure_univ, ENNReal.one_toReal, one_mul] #align probability_theory.mgf_const ProbabilityTheory.mgf_const @[simp] theorem cgf_const' [IsFiniteMeasure μ] (hμ : μ ≠ 0) (c : ℝ) : cgf (fun _ => c) μ t = log (μ Set.univ).toReal + t * c := by simp only [cgf, mgf_const'] rw [log_mul _ (exp_pos _).ne'] · rw [log_exp _] · rw [Ne, ENNReal.toReal_eq_zero_iff, Measure.measure_univ_eq_zero] simp only [hμ, measure_ne_top μ Set.univ, or_self_iff, not_false_iff] #align probability_theory.cgf_const' ProbabilityTheory.cgf_const' @[simp] theorem cgf_const [IsProbabilityMeasure μ] (c : ℝ) : cgf (fun _ => c) μ t = t * c := by simp only [cgf, mgf_const, log_exp] #align probability_theory.cgf_const ProbabilityTheory.cgf_const @[simp] theorem mgf_zero' : mgf X μ 0 = (μ Set.univ).toReal := by simp only [mgf, zero_mul, exp_zero, integral_const, smul_eq_mul, mul_one] #align probability_theory.mgf_zero' ProbabilityTheory.mgf_zero' -- @[simp] -- Porting note: `simp only` already proves this theorem mgf_zero [IsProbabilityMeasure μ] : mgf X μ 0 = 1 := by simp only [mgf_zero', measure_univ, ENNReal.one_toReal] #align probability_theory.mgf_zero ProbabilityTheory.mgf_zero @[simp] theorem cgf_zero' : cgf X μ 0 = log (μ Set.univ).toReal := by simp only [cgf, mgf_zero'] #align probability_theory.cgf_zero' ProbabilityTheory.cgf_zero' -- @[simp] -- Porting note: `simp only` already proves this theorem cgf_zero [IsProbabilityMeasure μ] : cgf X μ 0 = 0 := by simp only [cgf_zero', measure_univ, ENNReal.one_toReal, log_one] #align probability_theory.cgf_zero ProbabilityTheory.cgf_zero theorem mgf_undef (hX : ¬Integrable (fun ω => exp (t * X ω)) μ) : mgf X μ t = 0 := by simp only [mgf, integral_undef hX] #align probability_theory.mgf_undef ProbabilityTheory.mgf_undef theorem cgf_undef (hX : ¬Integrable (fun ω => exp (t * X ω)) μ) : cgf X μ t = 0 := by simp only [cgf, mgf_undef hX, log_zero] #align probability_theory.cgf_undef ProbabilityTheory.cgf_undef theorem mgf_nonneg : 0 ≤ mgf X μ t := by unfold mgf; positivity #align probability_theory.mgf_nonneg ProbabilityTheory.mgf_nonneg theorem mgf_pos' (hμ : μ ≠ 0) (h_int_X : Integrable (fun ω => exp (t * X ω)) μ) : 0 < mgf X μ t := by simp_rw [mgf] have : ∫ x : Ω, exp (t * X x) ∂μ = ∫ x : Ω in Set.univ, exp (t * X x) ∂μ := by simp only [Measure.restrict_univ] rw [this, setIntegral_pos_iff_support_of_nonneg_ae _ _] · have h_eq_univ : (Function.support fun x : Ω => exp (t * X x)) = Set.univ := by ext1 x simp only [Function.mem_support, Set.mem_univ, iff_true_iff] exact (exp_pos _).ne' rw [h_eq_univ, Set.inter_univ _] refine Ne.bot_lt ?_ simp only [hμ, ENNReal.bot_eq_zero, Ne, Measure.measure_univ_eq_zero, not_false_iff] · filter_upwards with x rw [Pi.zero_apply] exact (exp_pos _).le · rwa [integrableOn_univ] #align probability_theory.mgf_pos' ProbabilityTheory.mgf_pos' theorem mgf_pos [IsProbabilityMeasure μ] (h_int_X : Integrable (fun ω => exp (t * X ω)) μ) : 0 < mgf X μ t := mgf_pos' (IsProbabilityMeasure.ne_zero μ) h_int_X #align probability_theory.mgf_pos ProbabilityTheory.mgf_pos theorem mgf_neg : mgf (-X) μ t = mgf X μ (-t) := by simp_rw [mgf, Pi.neg_apply, mul_neg, neg_mul] #align probability_theory.mgf_neg ProbabilityTheory.mgf_neg theorem cgf_neg : cgf (-X) μ t = cgf X μ (-t) := by simp_rw [cgf, mgf_neg] #align probability_theory.cgf_neg ProbabilityTheory.cgf_neg theorem IndepFun.exp_mul {X Y : Ω → ℝ} (h_indep : IndepFun X Y μ) (s t : ℝ) : IndepFun (fun ω => exp (s * X ω)) (fun ω => exp (t * Y ω)) μ := by have h_meas : ∀ t, Measurable fun x => exp (t * x) := fun t => (measurable_id'.const_mul t).exp change IndepFun ((fun x => exp (s * x)) ∘ X) ((fun x => exp (t * x)) ∘ Y) μ exact IndepFun.comp h_indep (h_meas s) (h_meas t) #align probability_theory.indep_fun.exp_mul ProbabilityTheory.IndepFun.exp_mul theorem IndepFun.mgf_add {X Y : Ω → ℝ} (h_indep : IndepFun X Y μ) (hX : AEStronglyMeasurable (fun ω => exp (t * X ω)) μ) (hY : AEStronglyMeasurable (fun ω => exp (t * Y ω)) μ) : mgf (X + Y) μ t = mgf X μ t * mgf Y μ t := by simp_rw [mgf, Pi.add_apply, mul_add, exp_add] exact (h_indep.exp_mul t t).integral_mul hX hY #align probability_theory.indep_fun.mgf_add ProbabilityTheory.IndepFun.mgf_add	Mathlib/Probability/Moments.lean	232	239	theorem IndepFun.mgf_add' {X Y : Ω → ℝ} (h_indep : IndepFun X Y μ) (hX : AEStronglyMeasurable X μ) (hY : AEStronglyMeasurable Y μ) : mgf (X + Y) μ t = mgf X μ t * mgf Y μ t := by	have A : Continuous fun x : ℝ => exp (t * x) := by fun_prop have h'X : AEStronglyMeasurable (fun ω => exp (t * X ω)) μ := A.aestronglyMeasurable.comp_aemeasurable hX.aemeasurable have h'Y : AEStronglyMeasurable (fun ω => exp (t * Y ω)) μ := A.aestronglyMeasurable.comp_aemeasurable hY.aemeasurable exact h_indep.mgf_add h'X h'Y
import Mathlib.Algebra.MvPolynomial.Basic import Mathlib.Data.Finset.PiAntidiagonal import Mathlib.LinearAlgebra.StdBasis import Mathlib.Tactic.Linarith #align_import ring_theory.power_series.basic from "leanprover-community/mathlib"@"2d5739b61641ee4e7e53eca5688a08f66f2e6a60" noncomputable section open Finset (antidiagonal mem_antidiagonal) def MvPowerSeries (σ : Type) (R : Type) := (σ →₀ ℕ) → R #align mv_power_series MvPowerSeries namespace MvPowerSeries open Finsupp variable {σ R : Type} instance [Inhabited R] : Inhabited (MvPowerSeries σ R) := ⟨fun _ => default⟩ instance [Zero R] : Zero (MvPowerSeries σ R) := Pi.instZero instance [AddMonoid R] : AddMonoid (MvPowerSeries σ R) := Pi.addMonoid instance [AddGroup R] : AddGroup (MvPowerSeries σ R) := Pi.addGroup instance [AddCommMonoid R] : AddCommMonoid (MvPowerSeries σ R) := Pi.addCommMonoid instance [AddCommGroup R] : AddCommGroup (MvPowerSeries σ R) := Pi.addCommGroup instance [Nontrivial R] : Nontrivial (MvPowerSeries σ R) := Function.nontrivial instance {A} [Semiring R] [AddCommMonoid A] [Module R A] : Module R (MvPowerSeries σ A) := Pi.module _ _ _ instance {A S} [Semiring R] [Semiring S] [AddCommMonoid A] [Module R A] [Module S A] [SMul R S] [IsScalarTower R S A] : IsScalarTower R S (MvPowerSeries σ A) := Pi.isScalarTower instance [CommSemiring R] : CommSemiring (MvPowerSeries σ R) := { show Semiring (MvPowerSeries σ R) by infer_instance with mul_comm := fun φ ψ => ext fun n => by classical simpa only [coeff_mul, mul_comm] using sum_antidiagonal_swap n fun a b => coeff R a φ coeff R b ψ } instance [Ring R] : Ring (MvPowerSeries σ R) := { inferInstanceAs (Semiring (MvPowerSeries σ R)), inferInstanceAs (AddCommGroup (MvPowerSeries σ R)) with } instance [CommRing R] : CommRing (MvPowerSeries σ R) := { inferInstanceAs (CommSemiring (MvPowerSeries σ R)), inferInstanceAs (AddCommGroup (MvPowerSeries σ R)) with } section Semiring variable [Semiring R] theorem monomial_mul_monomial (m n : σ →₀ ℕ) (a b : R) : monomial R m a * monomial R n b = monomial R (m + n) (a * b) := by classical ext k simp only [coeff_mul_monomial, coeff_monomial] split_ifs with h₁ h₂ h₃ h₃ h₂ <;> try rfl · rw [← h₂, tsub_add_cancel_of_le h₁] at h₃ exact (h₃ rfl).elim · rw [h₃, add_tsub_cancel_right] at h₂ exact (h₂ rfl).elim · exact zero_mul b · rw [h₂] at h₁ exact (h₁ <\| le_add_left le_rfl).elim #align mv_power_series.monomial_mul_monomial MvPowerSeries.monomial_mul_monomial variable (σ) (R) def C : R →+* MvPowerSeries σ R := { monomial R (0 : σ →₀ ℕ) with map_one' := rfl map_mul' := fun a b => (monomial_mul_monomial 0 0 a b).symm map_zero' := (monomial R (0 : _)).map_zero } set_option linter.uppercaseLean3 false in #align mv_power_series.C MvPowerSeries.C variable {σ} {R} @[simp] theorem monomial_zero_eq_C : ⇑(monomial R (0 : σ →₀ ℕ)) = C σ R := rfl set_option linter.uppercaseLean3 false in #align mv_power_series.monomial_zero_eq_C MvPowerSeries.monomial_zero_eq_C theorem monomial_zero_eq_C_apply (a : R) : monomial R (0 : σ →₀ ℕ) a = C σ R a := rfl set_option linter.uppercaseLean3 false in #align mv_power_series.monomial_zero_eq_C_apply MvPowerSeries.monomial_zero_eq_C_apply theorem coeff_C [DecidableEq σ] (n : σ →₀ ℕ) (a : R) : coeff R n (C σ R a) = if n = 0 then a else 0 := coeff_monomial _ _ _ set_option linter.uppercaseLean3 false in #align mv_power_series.coeff_C MvPowerSeries.coeff_C theorem coeff_zero_C (a : R) : coeff R (0 : σ →₀ ℕ) (C σ R a) = a := coeff_monomial_same 0 a set_option linter.uppercaseLean3 false in #align mv_power_series.coeff_zero_C MvPowerSeries.coeff_zero_C def X (s : σ) : MvPowerSeries σ R := monomial R (single s 1) 1 set_option linter.uppercaseLean3 false in #align mv_power_series.X MvPowerSeries.X theorem coeff_X [DecidableEq σ] (n : σ →₀ ℕ) (s : σ) : coeff R n (X s : MvPowerSeries σ R) = if n = single s 1 then 1 else 0 := coeff_monomial _ _ _ set_option linter.uppercaseLean3 false in #align mv_power_series.coeff_X MvPowerSeries.coeff_X theorem coeff_index_single_X [DecidableEq σ] (s t : σ) : coeff R (single t 1) (X s : MvPowerSeries σ R) = if t = s then 1 else 0 := by simp only [coeff_X, single_left_inj (one_ne_zero : (1 : ℕ) ≠ 0)] set_option linter.uppercaseLean3 false in #align mv_power_series.coeff_index_single_X MvPowerSeries.coeff_index_single_X @[simp] theorem coeff_index_single_self_X (s : σ) : coeff R (single s 1) (X s : MvPowerSeries σ R) = 1 := coeff_monomial_same _ _ set_option linter.uppercaseLean3 false in #align mv_power_series.coeff_index_single_self_X MvPowerSeries.coeff_index_single_self_X theorem coeff_zero_X (s : σ) : coeff R (0 : σ →₀ ℕ) (X s : MvPowerSeries σ R) = 0 := by classical rw [coeff_X, if_neg] intro h exact one_ne_zero (single_eq_zero.mp h.symm) set_option linter.uppercaseLean3 false in #align mv_power_series.coeff_zero_X MvPowerSeries.coeff_zero_X theorem commute_X (φ : MvPowerSeries σ R) (s : σ) : Commute φ (X s) := φ.commute_monomial.mpr fun _m => Commute.one_right _ set_option linter.uppercaseLean3 false in #align mv_power_series.commute_X MvPowerSeries.commute_X theorem X_def (s : σ) : X s = monomial R (single s 1) 1 := rfl set_option linter.uppercaseLean3 false in #align mv_power_series.X_def MvPowerSeries.X_def theorem X_pow_eq (s : σ) (n : ℕ) : (X s : MvPowerSeries σ R) ^ n = monomial R (single s n) 1 := by induction' n with n ih · simp · rw [pow_succ, ih, Finsupp.single_add, X, monomial_mul_monomial, one_mul] set_option linter.uppercaseLean3 false in #align mv_power_series.X_pow_eq MvPowerSeries.X_pow_eq theorem coeff_X_pow [DecidableEq σ] (m : σ →₀ ℕ) (s : σ) (n : ℕ) : coeff R m ((X s : MvPowerSeries σ R) ^ n) = if m = single s n then 1 else 0 := by rw [X_pow_eq s n, coeff_monomial] set_option linter.uppercaseLean3 false in #align mv_power_series.coeff_X_pow MvPowerSeries.coeff_X_pow @[simp] theorem coeff_mul_C (n : σ →₀ ℕ) (φ : MvPowerSeries σ R) (a : R) : coeff R n (φ * C σ R a) = coeff R n φ * a := by simpa using coeff_add_mul_monomial n 0 φ a set_option linter.uppercaseLean3 false in #align mv_power_series.coeff_mul_C MvPowerSeries.coeff_mul_C @[simp] theorem coeff_C_mul (n : σ →₀ ℕ) (φ : MvPowerSeries σ R) (a : R) : coeff R n (C σ R a * φ) = a * coeff R n φ := by simpa using coeff_add_monomial_mul 0 n φ a set_option linter.uppercaseLean3 false in #align mv_power_series.coeff_C_mul MvPowerSeries.coeff_C_mul theorem coeff_zero_mul_X (φ : MvPowerSeries σ R) (s : σ) : coeff R (0 : σ →₀ ℕ) (φ * X s) = 0 := by have : ¬single s 1 ≤ 0 := fun h => by simpa using h s simp only [X, coeff_mul_monomial, if_neg this] set_option linter.uppercaseLean3 false in #align mv_power_series.coeff_zero_mul_X MvPowerSeries.coeff_zero_mul_X theorem coeff_zero_X_mul (φ : MvPowerSeries σ R) (s : σ) : coeff R (0 : σ →₀ ℕ) (X s * φ) = 0 := by rw [← (φ.commute_X s).eq, coeff_zero_mul_X] set_option linter.uppercaseLean3 false in #align mv_power_series.coeff_zero_X_mul MvPowerSeries.coeff_zero_X_mul variable (σ) (R) def constantCoeff : MvPowerSeries σ R →+* R := { coeff R (0 : σ →₀ ℕ) with toFun := coeff R (0 : σ →₀ ℕ) map_one' := coeff_zero_one map_mul' := fun φ ψ => by classical simp [coeff_mul, support_single_ne_zero] map_zero' := LinearMap.map_zero _ } #align mv_power_series.constant_coeff MvPowerSeries.constantCoeff variable {σ} {R} @[simp] theorem coeff_zero_eq_constantCoeff : ⇑(coeff R (0 : σ →₀ ℕ)) = constantCoeff σ R := rfl #align mv_power_series.coeff_zero_eq_constant_coeff MvPowerSeries.coeff_zero_eq_constantCoeff theorem coeff_zero_eq_constantCoeff_apply (φ : MvPowerSeries σ R) : coeff R (0 : σ →₀ ℕ) φ = constantCoeff σ R φ := rfl #align mv_power_series.coeff_zero_eq_constant_coeff_apply MvPowerSeries.coeff_zero_eq_constantCoeff_apply @[simp] theorem constantCoeff_C (a : R) : constantCoeff σ R (C σ R a) = a := rfl set_option linter.uppercaseLean3 false in #align mv_power_series.constant_coeff_C MvPowerSeries.constantCoeff_C @[simp] theorem constantCoeff_comp_C : (constantCoeff σ R).comp (C σ R) = RingHom.id R := rfl set_option linter.uppercaseLean3 false in #align mv_power_series.constant_coeff_comp_C MvPowerSeries.constantCoeff_comp_C -- Porting note (#10618): simp can prove this. -- @[simp] theorem constantCoeff_zero : constantCoeff σ R 0 = 0 := rfl #align mv_power_series.constant_coeff_zero MvPowerSeries.constantCoeff_zero -- Porting note (#10618): simp can prove this. -- @[simp] theorem constantCoeff_one : constantCoeff σ R 1 = 1 := rfl #align mv_power_series.constant_coeff_one MvPowerSeries.constantCoeff_one @[simp] theorem constantCoeff_X (s : σ) : constantCoeff σ R (X s) = 0 := coeff_zero_X s set_option linter.uppercaseLean3 false in #align mv_power_series.constant_coeff_X MvPowerSeries.constantCoeff_X theorem isUnit_constantCoeff (φ : MvPowerSeries σ R) (h : IsUnit φ) : IsUnit (constantCoeff σ R φ) := h.map _ #align mv_power_series.is_unit_constant_coeff MvPowerSeries.isUnit_constantCoeff -- Porting note (#10618): simp can prove this. -- @[simp] theorem coeff_smul (f : MvPowerSeries σ R) (n) (a : R) : coeff _ n (a • f) = a * coeff _ n f := rfl #align mv_power_series.coeff_smul MvPowerSeries.coeff_smul	Mathlib/RingTheory/MvPowerSeries/Basic.lean	514	516	theorem smul_eq_C_mul (f : MvPowerSeries σ R) (a : R) : a • f = C σ R a * f := by	ext simp
import Mathlib.Algebra.Category.ModuleCat.Free import Mathlib.Topology.Category.Profinite.CofilteredLimit import Mathlib.Topology.Category.Profinite.Product import Mathlib.Topology.LocallyConstant.Algebra import Mathlib.Init.Data.Bool.Lemmas universe u namespace Profinite namespace NobelingProof variable {I : Type u} [LinearOrder I] [IsWellOrder I (·<·)] (C : Set (I → Bool)) open Profinite ContinuousMap CategoryTheory Limits Opposite Submodule def GoodProducts := {l : Products I \| l.isGood C} section Span section Fin variable (s : Finset I) noncomputable def πJ : LocallyConstant (π C (· ∈ s)) ℤ →ₗ[ℤ] LocallyConstant C ℤ := LocallyConstant.comapₗ ℤ ⟨_, (continuous_projRestrict C (· ∈ s))⟩ theorem eval_eq_πJ (l : Products I) (hl : l.isGood (π C (· ∈ s))) : l.eval C = πJ C s (l.eval (π C (· ∈ s))) := by ext f simp only [πJ, LocallyConstant.comapₗ, LinearMap.coe_mk, AddHom.coe_mk, (continuous_projRestrict C (· ∈ s)), LocallyConstant.coe_comap, Function.comp_apply] exact (congr_fun (Products.evalFacProp C (· ∈ s) (Products.prop_of_isGood C (· ∈ s) hl)) _).symm noncomputable instance : Fintype (π C (· ∈ s)) := by let f : π C (· ∈ s) → (s → Bool) := fun x j ↦ x.val j.val refine Fintype.ofInjective f ?_ intro ⟨_, x, hx, rfl⟩ ⟨_, y, hy, rfl⟩ h ext i by_cases hi : i ∈ s · exact congrFun h ⟨i, hi⟩ · simp only [Proj, if_neg hi] open scoped Classical in noncomputable def spanFinBasis (x : π C (· ∈ s)) : LocallyConstant (π C (· ∈ s)) ℤ where toFun := fun y ↦ if y = x then 1 else 0 isLocallyConstant := haveI : DiscreteTopology (π C (· ∈ s)) := discrete_of_t1_of_finite IsLocallyConstant.of_discrete _ open scoped Classical in theorem spanFinBasis.span : ⊤ ≤ Submodule.span ℤ (Set.range (spanFinBasis C s)) := by intro f _ rw [Finsupp.mem_span_range_iff_exists_finsupp] use Finsupp.onFinset (Finset.univ) f.toFun (fun _ _ ↦ Finset.mem_univ _) ext x change LocallyConstant.evalₗ ℤ x _ = _ simp only [zsmul_eq_mul, map_finsupp_sum, LocallyConstant.evalₗ_apply, LocallyConstant.coe_mul, Pi.mul_apply, spanFinBasis, LocallyConstant.coe_mk, mul_ite, mul_one, mul_zero, Finsupp.sum_ite_eq, Finsupp.mem_support_iff, ne_eq, ite_not] split_ifs with h <;> [exact h.symm; rfl] def factors (x : π C (· ∈ s)) : List (LocallyConstant (π C (· ∈ s)) ℤ) := List.map (fun i ↦ if x.val i = true then e (π C (· ∈ s)) i else (1 - (e (π C (· ∈ s)) i))) (s.sort (·≥·)) theorem list_prod_apply (x : C) (l : List (LocallyConstant C ℤ)) : l.prod x = (l.map (LocallyConstant.evalMonoidHom x)).prod := by rw [← map_list_prod (LocallyConstant.evalMonoidHom x) l] rfl theorem factors_prod_eq_basis_of_eq {x y : (π C fun x ↦ x ∈ s)} (h : y = x) : (factors C s x).prod y = 1 := by rw [list_prod_apply (π C (· ∈ s)) y _] apply List.prod_eq_one simp only [h, List.mem_map, LocallyConstant.evalMonoidHom, factors] rintro _ ⟨a, ⟨b, _, rfl⟩, rfl⟩ dsimp split_ifs with hh · rw [e, LocallyConstant.coe_mk, if_pos hh] · rw [LocallyConstant.sub_apply, e, LocallyConstant.coe_mk, LocallyConstant.coe_mk, if_neg hh] simp only [LocallyConstant.toFun_eq_coe, LocallyConstant.coe_one, Pi.one_apply, sub_zero] theorem e_mem_of_eq_true {x : (π C (· ∈ s))} {a : I} (hx : x.val a = true) : e (π C (· ∈ s)) a ∈ factors C s x := by rcases x with ⟨_, z, hz, rfl⟩ simp only [factors, List.mem_map, Finset.mem_sort] refine ⟨a, ?_, if_pos hx⟩ aesop (add simp Proj) theorem one_sub_e_mem_of_false {x y : (π C (· ∈ s))} {a : I} (ha : y.val a = true) (hx : x.val a = false) : 1 - e (π C (· ∈ s)) a ∈ factors C s x := by simp only [factors, List.mem_map, Finset.mem_sort] use a simp only [hx, ite_false, and_true] rcases y with ⟨_, z, hz, rfl⟩ aesop (add simp Proj) theorem factors_prod_eq_basis_of_ne {x y : (π C (· ∈ s))} (h : y ≠ x) : (factors C s x).prod y = 0 := by rw [list_prod_apply (π C (· ∈ s)) y _] apply List.prod_eq_zero simp only [List.mem_map] obtain ⟨a, ha⟩ : ∃ a, y.val a ≠ x.val a := by contrapose! h; ext; apply h cases hx : x.val a · rw [hx, ne_eq, Bool.not_eq_false] at ha refine ⟨1 - (e (π C (· ∈ s)) a), ⟨one_sub_e_mem_of_false _ _ ha hx, ?_⟩⟩ rw [e, LocallyConstant.evalMonoidHom_apply, LocallyConstant.sub_apply, LocallyConstant.coe_one, Pi.one_apply, LocallyConstant.coe_mk, if_pos ha, sub_self] · refine ⟨e (π C (· ∈ s)) a, ⟨e_mem_of_eq_true _ _ hx, ?_⟩⟩ rw [hx] at ha rw [LocallyConstant.evalMonoidHom_apply, e, LocallyConstant.coe_mk, if_neg ha] theorem factors_prod_eq_basis (x : π C (· ∈ s)) : (factors C s x).prod = spanFinBasis C s x := by ext y dsimp [spanFinBasis] split_ifs with h <;> [exact factors_prod_eq_basis_of_eq _ _ h; exact factors_prod_eq_basis_of_ne _ _ h] theorem GoodProducts.finsupp_sum_mem_span_eval {a : I} {as : List I} (ha : List.Chain' (· > ·) (a :: as)) {c : Products I →₀ ℤ} (hc : (c.support : Set (Products I)) ⊆ {m \| m.val ≤ as}) : (Finsupp.sum c fun a_1 b ↦ e (π C (· ∈ s)) a * b • Products.eval (π C (· ∈ s)) a_1) ∈ Submodule.span ℤ (Products.eval (π C (· ∈ s)) '' {m \| m.val ≤ a :: as}) := by apply Submodule.finsupp_sum_mem intro m hm have hsm := (LinearMap.mulLeft ℤ (e (π C (· ∈ s)) a)).map_smul dsimp at hsm rw [hsm] apply Submodule.smul_mem apply Submodule.subset_span have hmas : m.val ≤ as := by apply hc simpa only [Finset.mem_coe, Finsupp.mem_support_iff] using hm refine ⟨⟨a :: m.val, ha.cons_of_le m.prop hmas⟩, ⟨List.cons_le_cons a hmas, ?_⟩⟩ simp only [Products.eval, List.map, List.prod_cons]	Mathlib/Topology/Category/Profinite/Nobeling.lean	599	649	theorem GoodProducts.spanFin : ⊤ ≤ Submodule.span ℤ (Set.range (eval (π C (· ∈ s)))) := by	rw [span_iff_products] refine le_trans (spanFinBasis.span C s) ?_ rw [Submodule.span_le] rintro _ ⟨x, rfl⟩ rw [← factors_prod_eq_basis] let l := s.sort (·≥·) dsimp [factors] suffices l.Chain' (·>·) → (l.map (fun i ↦ if x.val i = true then e (π C (· ∈ s)) i else (1 - (e (π C (· ∈ s)) i)))).prod ∈ Submodule.span ℤ ((Products.eval (π C (· ∈ s))) '' {m \| m.val ≤ l}) from Submodule.span_mono (Set.image_subset_range _ _) (this (Finset.sort_sorted_gt _).chain') induction l with \| nil => intro _ apply Submodule.subset_span exact ⟨⟨[], List.chain'_nil⟩,⟨Or.inl rfl, rfl⟩⟩ \| cons a as ih => rw [List.map_cons, List.prod_cons] intro ha specialize ih (by rw [List.chain'_cons'] at ha; exact ha.2) rw [Finsupp.mem_span_image_iff_total] at ih simp only [Finsupp.mem_supported, Finsupp.total_apply] at ih obtain ⟨c, hc, hc'⟩ := ih rw [← hc']; clear hc' have hmap := fun g ↦ map_finsupp_sum (LinearMap.mulLeft ℤ (e (π C (· ∈ s)) a)) c g dsimp at hmap ⊢ split_ifs · rw [hmap] exact finsupp_sum_mem_span_eval _ _ ha hc · ring_nf rw [hmap] apply Submodule.add_mem · apply Submodule.neg_mem exact finsupp_sum_mem_span_eval _ _ ha hc · apply Submodule.finsupp_sum_mem intro m hm apply Submodule.smul_mem apply Submodule.subset_span refine ⟨m, ⟨?_, rfl⟩⟩ simp only [Set.mem_setOf_eq] have hmas : m.val ≤ as := hc (by simpa only [Finset.mem_coe, Finsupp.mem_support_iff] using hm) refine le_trans hmas ?_ cases as with \| nil => exact (List.nil_lt_cons a []).le \| cons b bs => apply le_of_lt rw [List.chain'_cons] at ha have hlex := List.lt.head bs (b :: bs) ha.1 exact (List.lt_iff_lex_lt _ _).mp hlex
import Mathlib.Algebra.Order.Ring.Defs import Mathlib.Algebra.Group.Int import Mathlib.Data.Nat.Dist import Mathlib.Data.Ordmap.Ordnode import Mathlib.Tactic.Abel import Mathlib.Tactic.Linarith #align_import data.ordmap.ordset from "leanprover-community/mathlib"@"47b51515e69f59bca5cf34ef456e6000fe205a69" variable {α : Type} namespace Ordnode theorem not_le_delta {s} (H : 1 ≤ s) : ¬s ≤ delta 0 := not_le_of_gt H #align ordnode.not_le_delta Ordnode.not_le_delta theorem delta_lt_false {a b : ℕ} (h₁ : delta * a < b) (h₂ : delta * b < a) : False := not_le_of_lt (lt_trans ((mul_lt_mul_left (by decide)).2 h₁) h₂) <\| by simpa [mul_assoc] using Nat.mul_le_mul_right a (by decide : 1 ≤ delta * delta) #align ordnode.delta_lt_false Ordnode.delta_lt_false def realSize : Ordnode α → ℕ \| nil => 0 \| node _ l _ r => realSize l + realSize r + 1 #align ordnode.real_size Ordnode.realSize def Sized : Ordnode α → Prop \| nil => True \| node s l _ r => s = size l + size r + 1 ∧ Sized l ∧ Sized r #align ordnode.sized Ordnode.Sized theorem Sized.node' {l x r} (hl : @Sized α l) (hr : Sized r) : Sized (node' l x r) := ⟨rfl, hl, hr⟩ #align ordnode.sized.node' Ordnode.Sized.node' theorem Sized.eq_node' {s l x r} (h : @Sized α (node s l x r)) : node s l x r = .node' l x r := by rw [h.1] #align ordnode.sized.eq_node' Ordnode.Sized.eq_node' theorem Sized.size_eq {s l x r} (H : Sized (@node α s l x r)) : size (@node α s l x r) = size l + size r + 1 := H.1 #align ordnode.sized.size_eq Ordnode.Sized.size_eq @[elab_as_elim] theorem Sized.induction {t} (hl : @Sized α t) {C : Ordnode α → Prop} (H0 : C nil) (H1 : ∀ l x r, C l → C r → C (.node' l x r)) : C t := by induction t with \| nil => exact H0 \| node _ _ _ _ t_ih_l t_ih_r => rw [hl.eq_node'] exact H1 _ _ _ (t_ih_l hl.2.1) (t_ih_r hl.2.2) #align ordnode.sized.induction Ordnode.Sized.induction theorem size_eq_realSize : ∀ {t : Ordnode α}, Sized t → size t = realSize t \| nil, _ => rfl \| node s l x r, ⟨h₁, h₂, h₃⟩ => by rw [size, h₁, size_eq_realSize h₂, size_eq_realSize h₃]; rfl #align ordnode.size_eq_real_size Ordnode.size_eq_realSize @[simp] theorem Sized.size_eq_zero {t : Ordnode α} (ht : Sized t) : size t = 0 ↔ t = nil := by cases t <;> [simp;simp [ht.1]] #align ordnode.sized.size_eq_zero Ordnode.Sized.size_eq_zero theorem Sized.pos {s l x r} (h : Sized (@node α s l x r)) : 0 < s := by rw [h.1]; apply Nat.le_add_left #align ordnode.sized.pos Ordnode.Sized.pos theorem dual_dual : ∀ t : Ordnode α, dual (dual t) = t \| nil => rfl \| node s l x r => by rw [dual, dual, dual_dual l, dual_dual r] #align ordnode.dual_dual Ordnode.dual_dual @[simp] theorem size_dual (t : Ordnode α) : size (dual t) = size t := by cases t <;> rfl #align ordnode.size_dual Ordnode.size_dual def BalancedSz (l r : ℕ) : Prop := l + r ≤ 1 ∨ l ≤ delta * r ∧ r ≤ delta * l #align ordnode.balanced_sz Ordnode.BalancedSz instance BalancedSz.dec : DecidableRel BalancedSz := fun _ _ => Or.decidable #align ordnode.balanced_sz.dec Ordnode.BalancedSz.dec def Balanced : Ordnode α → Prop \| nil => True \| node _ l _ r => BalancedSz (size l) (size r) ∧ Balanced l ∧ Balanced r #align ordnode.balanced Ordnode.Balanced instance Balanced.dec : DecidablePred (@Balanced α) \| nil => by unfold Balanced infer_instance \| node _ l _ r => by unfold Balanced haveI := Balanced.dec l haveI := Balanced.dec r infer_instance #align ordnode.balanced.dec Ordnode.Balanced.dec @[symm] theorem BalancedSz.symm {l r : ℕ} : BalancedSz l r → BalancedSz r l := Or.imp (by rw [add_comm]; exact id) And.symm #align ordnode.balanced_sz.symm Ordnode.BalancedSz.symm theorem balancedSz_zero {l : ℕ} : BalancedSz l 0 ↔ l ≤ 1 := by simp (config := { contextual := true }) [BalancedSz] #align ordnode.balanced_sz_zero Ordnode.balancedSz_zero theorem balancedSz_up {l r₁ r₂ : ℕ} (h₁ : r₁ ≤ r₂) (h₂ : l + r₂ ≤ 1 ∨ r₂ ≤ delta * l) (H : BalancedSz l r₁) : BalancedSz l r₂ := by refine or_iff_not_imp_left.2 fun h => ?_ refine ⟨?_, h₂.resolve_left h⟩ cases H with \| inl H => cases r₂ · cases h (le_trans (Nat.add_le_add_left (Nat.zero_le _) _) H) · exact le_trans (le_trans (Nat.le_add_right _ _) H) (Nat.le_add_left 1 _) \| inr H => exact le_trans H.1 (Nat.mul_le_mul_left _ h₁) #align ordnode.balanced_sz_up Ordnode.balancedSz_up theorem balancedSz_down {l r₁ r₂ : ℕ} (h₁ : r₁ ≤ r₂) (h₂ : l + r₂ ≤ 1 ∨ l ≤ delta * r₁) (H : BalancedSz l r₂) : BalancedSz l r₁ := have : l + r₂ ≤ 1 → BalancedSz l r₁ := fun H => Or.inl (le_trans (Nat.add_le_add_left h₁ _) H) Or.casesOn H this fun H => Or.casesOn h₂ this fun h₂ => Or.inr ⟨h₂, le_trans h₁ H.2⟩ #align ordnode.balanced_sz_down Ordnode.balancedSz_down theorem Balanced.dual : ∀ {t : Ordnode α}, Balanced t → Balanced (dual t) \| nil, _ => ⟨⟩ \| node _ l _ r, ⟨b, bl, br⟩ => ⟨by rw [size_dual, size_dual]; exact b.symm, br.dual, bl.dual⟩ #align ordnode.balanced.dual Ordnode.Balanced.dual def node3L (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : Ordnode α := node' (node' l x m) y r #align ordnode.node3_l Ordnode.node3L def node3R (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : Ordnode α := node' l x (node' m y r) #align ordnode.node3_r Ordnode.node3R def node4L : Ordnode α → α → Ordnode α → α → Ordnode α → Ordnode α \| l, x, node _ ml y mr, z, r => node' (node' l x ml) y (node' mr z r) \| l, x, nil, z, r => node3L l x nil z r #align ordnode.node4_l Ordnode.node4L -- should not happen def node4R : Ordnode α → α → Ordnode α → α → Ordnode α → Ordnode α \| l, x, node _ ml y mr, z, r => node' (node' l x ml) y (node' mr z r) \| l, x, nil, z, r => node3R l x nil z r #align ordnode.node4_r Ordnode.node4R -- should not happen def rotateL : Ordnode α → α → Ordnode α → Ordnode α \| l, x, node _ m y r => if size m < ratio * size r then node3L l x m y r else node4L l x m y r \| l, x, nil => node' l x nil #align ordnode.rotate_l Ordnode.rotateL -- Porting note (#11467): during the port we marked these lemmas with `@[eqns]` -- to emulate the old Lean 3 behaviour. theorem rotateL_node (l : Ordnode α) (x : α) (sz : ℕ) (m : Ordnode α) (y : α) (r : Ordnode α) : rotateL l x (node sz m y r) = if size m < ratio * size r then node3L l x m y r else node4L l x m y r := rfl theorem rotateL_nil (l : Ordnode α) (x : α) : rotateL l x nil = node' l x nil := rfl -- should not happen def rotateR : Ordnode α → α → Ordnode α → Ordnode α \| node _ l x m, y, r => if size m < ratio * size l then node3R l x m y r else node4R l x m y r \| nil, y, r => node' nil y r #align ordnode.rotate_r Ordnode.rotateR -- Porting note (#11467): during the port we marked these lemmas with `@[eqns]` -- to emulate the old Lean 3 behaviour. theorem rotateR_node (sz : ℕ) (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : rotateR (node sz l x m) y r = if size m < ratio * size l then node3R l x m y r else node4R l x m y r := rfl theorem rotateR_nil (y : α) (r : Ordnode α) : rotateR nil y r = node' nil y r := rfl -- should not happen def balanceL' (l : Ordnode α) (x : α) (r : Ordnode α) : Ordnode α := if size l + size r ≤ 1 then node' l x r else if size l > delta * size r then rotateR l x r else node' l x r #align ordnode.balance_l' Ordnode.balanceL' def balanceR' (l : Ordnode α) (x : α) (r : Ordnode α) : Ordnode α := if size l + size r ≤ 1 then node' l x r else if size r > delta * size l then rotateL l x r else node' l x r #align ordnode.balance_r' Ordnode.balanceR' def balance' (l : Ordnode α) (x : α) (r : Ordnode α) : Ordnode α := if size l + size r ≤ 1 then node' l x r else if size r > delta * size l then rotateL l x r else if size l > delta * size r then rotateR l x r else node' l x r #align ordnode.balance' Ordnode.balance' theorem dual_node' (l : Ordnode α) (x : α) (r : Ordnode α) : dual (node' l x r) = node' (dual r) x (dual l) := by simp [node', add_comm] #align ordnode.dual_node' Ordnode.dual_node'	Mathlib/Data/Ordmap/Ordset.lean	316	318	theorem dual_node3L (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : dual (node3L l x m y r) = node3R (dual r) y (dual m) x (dual l) := by	simp [node3L, node3R, dual_node', add_comm]
import Mathlib.Data.Set.Function import Mathlib.Analysis.BoundedVariation #align_import analysis.constant_speed from "leanprover-community/mathlib"@"f0c8bf9245297a541f468be517f1bde6195105e9" open scoped NNReal ENNReal open Set MeasureTheory Classical variable {α : Type} [LinearOrder α] {E : Type} [PseudoEMetricSpace E] variable (f : ℝ → E) (s : Set ℝ) (l : ℝ≥0) def HasConstantSpeedOnWith := ∀ ⦃x⦄ (_ : x ∈ s) ⦃y⦄ (_ : y ∈ s), eVariationOn f (s ∩ Icc x y) = ENNReal.ofReal (l * (y - x)) #align has_constant_speed_on_with HasConstantSpeedOnWith variable {f s l} theorem HasConstantSpeedOnWith.hasLocallyBoundedVariationOn (h : HasConstantSpeedOnWith f s l) : LocallyBoundedVariationOn f s := fun x y hx hy => by simp only [BoundedVariationOn, h hx hy, Ne, ENNReal.ofReal_ne_top, not_false_iff] #align has_constant_speed_on_with.has_locally_bounded_variation_on HasConstantSpeedOnWith.hasLocallyBoundedVariationOn theorem hasConstantSpeedOnWith_of_subsingleton (f : ℝ → E) {s : Set ℝ} (hs : s.Subsingleton) (l : ℝ≥0) : HasConstantSpeedOnWith f s l := by rintro x hx y hy; cases hs hx hy rw [eVariationOn.subsingleton f (fun y hy z hz => hs hy.1 hz.1 : (s ∩ Icc x x).Subsingleton)] simp only [sub_self, mul_zero, ENNReal.ofReal_zero] #align has_constant_speed_on_with_of_subsingleton hasConstantSpeedOnWith_of_subsingleton theorem hasConstantSpeedOnWith_iff_ordered : HasConstantSpeedOnWith f s l ↔ ∀ ⦃x⦄ (_ : x ∈ s) ⦃y⦄ (_ : y ∈ s), x ≤ y → eVariationOn f (s ∩ Icc x y) = ENNReal.ofReal (l * (y - x)) := by refine ⟨fun h x xs y ys _ => h xs ys, fun h x xs y ys => ?_⟩ rcases le_total x y with (xy \| yx) · exact h xs ys xy · rw [eVariationOn.subsingleton, ENNReal.ofReal_of_nonpos] · exact mul_nonpos_of_nonneg_of_nonpos l.prop (sub_nonpos_of_le yx) · rintro z ⟨zs, xz, zy⟩ w ⟨ws, xw, wy⟩ cases le_antisymm (zy.trans yx) xz cases le_antisymm (wy.trans yx) xw rfl #align has_constant_speed_on_with_iff_ordered hasConstantSpeedOnWith_iff_ordered theorem hasConstantSpeedOnWith_iff_variationOnFromTo_eq : HasConstantSpeedOnWith f s l ↔ LocallyBoundedVariationOn f s ∧ ∀ ⦃x⦄ (_ : x ∈ s) ⦃y⦄ (_ : y ∈ s), variationOnFromTo f s x y = l * (y - x) := by constructor · rintro h; refine ⟨h.hasLocallyBoundedVariationOn, fun x xs y ys => ?_⟩ rw [hasConstantSpeedOnWith_iff_ordered] at h rcases le_total x y with (xy \| yx) · rw [variationOnFromTo.eq_of_le f s xy, h xs ys xy] exact ENNReal.toReal_ofReal (mul_nonneg l.prop (sub_nonneg.mpr xy)) · rw [variationOnFromTo.eq_of_ge f s yx, h ys xs yx] have := ENNReal.toReal_ofReal (mul_nonneg l.prop (sub_nonneg.mpr yx)) simp_all only [NNReal.val_eq_coe]; ring · rw [hasConstantSpeedOnWith_iff_ordered] rintro h x xs y ys xy rw [← h.2 xs ys, variationOnFromTo.eq_of_le f s xy, ENNReal.ofReal_toReal (h.1 x y xs ys)] #align has_constant_speed_on_with_iff_variation_on_from_to_eq hasConstantSpeedOnWith_iff_variationOnFromTo_eq theorem HasConstantSpeedOnWith.union {t : Set ℝ} (hfs : HasConstantSpeedOnWith f s l) (hft : HasConstantSpeedOnWith f t l) {x : ℝ} (hs : IsGreatest s x) (ht : IsLeast t x) : HasConstantSpeedOnWith f (s ∪ t) l := by rw [hasConstantSpeedOnWith_iff_ordered] at hfs hft ⊢ rintro z (zs \| zt) y (ys \| yt) zy · have : (s ∪ t) ∩ Icc z y = s ∩ Icc z y := by ext w; constructor · rintro ⟨ws \| wt, zw, wy⟩ · exact ⟨ws, zw, wy⟩ · exact ⟨(le_antisymm (wy.trans (hs.2 ys)) (ht.2 wt)).symm ▸ hs.1, zw, wy⟩ · rintro ⟨ws, zwy⟩; exact ⟨Or.inl ws, zwy⟩ rw [this, hfs zs ys zy] · have : (s ∪ t) ∩ Icc z y = s ∩ Icc z x ∪ t ∩ Icc x y := by ext w; constructor · rintro ⟨ws \| wt, zw, wy⟩ exacts [Or.inl ⟨ws, zw, hs.2 ws⟩, Or.inr ⟨wt, ht.2 wt, wy⟩] · rintro (⟨ws, zw, wx⟩ \| ⟨wt, xw, wy⟩) exacts [⟨Or.inl ws, zw, wx.trans (ht.2 yt)⟩, ⟨Or.inr wt, (hs.2 zs).trans xw, wy⟩] rw [this, @eVariationOn.union _ _ _ _ f _ _ x, hfs zs hs.1 (hs.2 zs), hft ht.1 yt (ht.2 yt)] · have q := ENNReal.ofReal_add (mul_nonneg l.prop (sub_nonneg.mpr (hs.2 zs))) (mul_nonneg l.prop (sub_nonneg.mpr (ht.2 yt))) simp only [NNReal.val_eq_coe] at q rw [← q] ring_nf exacts [⟨⟨hs.1, hs.2 zs, le_rfl⟩, fun w ⟨_, _, wx⟩ => wx⟩, ⟨⟨ht.1, le_rfl, ht.2 yt⟩, fun w ⟨_, xw, _⟩ => xw⟩] · cases le_antisymm zy ((hs.2 ys).trans (ht.2 zt)) simp only [Icc_self, sub_self, mul_zero, ENNReal.ofReal_zero] exact eVariationOn.subsingleton _ fun _ ⟨_, uz⟩ _ ⟨_, vz⟩ => uz.trans vz.symm · have : (s ∪ t) ∩ Icc z y = t ∩ Icc z y := by ext w; constructor · rintro ⟨ws \| wt, zw, wy⟩ · exact ⟨le_antisymm ((ht.2 zt).trans zw) (hs.2 ws) ▸ ht.1, zw, wy⟩ · exact ⟨wt, zw, wy⟩ · rintro ⟨wt, zwy⟩; exact ⟨Or.inr wt, zwy⟩ rw [this, hft zt yt zy] #align has_constant_speed_on_with.union HasConstantSpeedOnWith.union theorem HasConstantSpeedOnWith.Icc_Icc {x y z : ℝ} (hfs : HasConstantSpeedOnWith f (Icc x y) l) (hft : HasConstantSpeedOnWith f (Icc y z) l) : HasConstantSpeedOnWith f (Icc x z) l := by rcases le_total x y with (xy \| yx) · rcases le_total y z with (yz \| zy) · rw [← Set.Icc_union_Icc_eq_Icc xy yz] exact hfs.union hft (isGreatest_Icc xy) (isLeast_Icc yz) · rintro u ⟨xu, uz⟩ v ⟨xv, vz⟩ rw [Icc_inter_Icc, sup_of_le_right xu, inf_of_le_right vz, ← hfs ⟨xu, uz.trans zy⟩ ⟨xv, vz.trans zy⟩, Icc_inter_Icc, sup_of_le_right xu, inf_of_le_right (vz.trans zy)] · rintro u ⟨xu, uz⟩ v ⟨xv, vz⟩ rw [Icc_inter_Icc, sup_of_le_right xu, inf_of_le_right vz, ← hft ⟨yx.trans xu, uz⟩ ⟨yx.trans xv, vz⟩, Icc_inter_Icc, sup_of_le_right (yx.trans xu), inf_of_le_right vz] #align has_constant_speed_on_with.Icc_Icc HasConstantSpeedOnWith.Icc_Icc theorem hasConstantSpeedOnWith_zero_iff : HasConstantSpeedOnWith f s 0 ↔ ∀ᵉ (x ∈ s) (y ∈ s), edist (f x) (f y) = 0 := by dsimp [HasConstantSpeedOnWith] simp only [zero_mul, ENNReal.ofReal_zero, ← eVariationOn.eq_zero_iff] constructor · by_contra! obtain ⟨h, hfs⟩ := this simp_rw [ne_eq, eVariationOn.eq_zero_iff] at hfs h push_neg at hfs obtain ⟨x, xs, y, ys, hxy⟩ := hfs rcases le_total x y with (xy \| yx) · exact hxy (h xs ys x ⟨xs, le_rfl, xy⟩ y ⟨ys, xy, le_rfl⟩) · rw [edist_comm] at hxy exact hxy (h ys xs y ⟨ys, le_rfl, yx⟩ x ⟨xs, yx, le_rfl⟩) · rintro h x _ y _ refine le_antisymm ?_ zero_le' rw [← h] exact eVariationOn.mono f inter_subset_left #align has_constant_speed_on_with_zero_iff hasConstantSpeedOnWith_zero_iff theorem HasConstantSpeedOnWith.ratio {l' : ℝ≥0} (hl' : l' ≠ 0) {φ : ℝ → ℝ} (φm : MonotoneOn φ s) (hfφ : HasConstantSpeedOnWith (f ∘ φ) s l) (hf : HasConstantSpeedOnWith f (φ '' s) l') ⦃x : ℝ⦄ (xs : x ∈ s) : EqOn φ (fun y => l / l' * (y - x) + φ x) s := by rintro y ys rw [← sub_eq_iff_eq_add, mul_comm, ← mul_div_assoc, eq_div_iff (NNReal.coe_ne_zero.mpr hl')] rw [hasConstantSpeedOnWith_iff_variationOnFromTo_eq] at hf rw [hasConstantSpeedOnWith_iff_variationOnFromTo_eq] at hfφ symm calc (y - x) * l = l * (y - x) := by rw [mul_comm] _ = variationOnFromTo (f ∘ φ) s x y := (hfφ.2 xs ys).symm _ = variationOnFromTo f (φ '' s) (φ x) (φ y) := (variationOnFromTo.comp_eq_of_monotoneOn f φ φm xs ys) _ = l' * (φ y - φ x) := (hf.2 ⟨x, xs, rfl⟩ ⟨y, ys, rfl⟩) _ = (φ y - φ x) * l' := by rw [mul_comm] #align has_constant_speed_on_with.ratio HasConstantSpeedOnWith.ratio def HasUnitSpeedOn (f : ℝ → E) (s : Set ℝ) := HasConstantSpeedOnWith f s 1 #align has_unit_speed_on HasUnitSpeedOn theorem HasUnitSpeedOn.union {t : Set ℝ} {x : ℝ} (hfs : HasUnitSpeedOn f s) (hft : HasUnitSpeedOn f t) (hs : IsGreatest s x) (ht : IsLeast t x) : HasUnitSpeedOn f (s ∪ t) := HasConstantSpeedOnWith.union hfs hft hs ht #align has_unit_speed_on.union HasUnitSpeedOn.union theorem HasUnitSpeedOn.Icc_Icc {x y z : ℝ} (hfs : HasUnitSpeedOn f (Icc x y)) (hft : HasUnitSpeedOn f (Icc y z)) : HasUnitSpeedOn f (Icc x z) := HasConstantSpeedOnWith.Icc_Icc hfs hft #align has_unit_speed_on.Icc_Icc HasUnitSpeedOn.Icc_Icc theorem unique_unit_speed {φ : ℝ → ℝ} (φm : MonotoneOn φ s) (hfφ : HasUnitSpeedOn (f ∘ φ) s) (hf : HasUnitSpeedOn f (φ '' s)) ⦃x : ℝ⦄ (xs : x ∈ s) : EqOn φ (fun y => y - x + φ x) s := by dsimp only [HasUnitSpeedOn] at hf hfφ convert HasConstantSpeedOnWith.ratio one_ne_zero φm hfφ hf xs using 3 norm_num #align unique_unit_speed unique_unit_speed	Mathlib/Analysis/ConstantSpeed.lean	222	235	theorem unique_unit_speed_on_Icc_zero {s t : ℝ} (hs : 0 ≤ s) (ht : 0 ≤ t) {φ : ℝ → ℝ} (φm : MonotoneOn φ <\| Icc 0 s) (φst : φ '' Icc 0 s = Icc 0 t) (hfφ : HasUnitSpeedOn (f ∘ φ) (Icc 0 s)) (hf : HasUnitSpeedOn f (Icc 0 t)) : EqOn φ id (Icc 0 s) := by	rw [← φst] at hf convert unique_unit_speed φm hfφ hf ⟨le_rfl, hs⟩ using 1 have : φ 0 = 0 := by have hm : 0 ∈ φ '' Icc 0 s := by simp only [φst, ht, mem_Icc, le_refl, and_self] obtain ⟨x, xs, hx⟩ := hm apply le_antisymm ((φm ⟨le_rfl, hs⟩ xs xs.1).trans_eq hx) _ have := φst ▸ mapsTo_image φ (Icc 0 s) exact (mem_Icc.mp (@this 0 (by rw [mem_Icc]; exact ⟨le_rfl, hs⟩))).1 simp only [tsub_zero, this, add_zero] rfl
import Mathlib.Order.Cover import Mathlib.Order.Interval.Finset.Defs #align_import data.finset.locally_finite from "leanprover-community/mathlib"@"442a83d738cb208d3600056c489be16900ba701d" assert_not_exists MonoidWithZero assert_not_exists Finset.sum open Function OrderDual open FinsetInterval variable {ι α : Type*} namespace Finset section Preorder variable [Preorder α] section LocallyFiniteOrder variable [LocallyFiniteOrder α] {a a₁ a₂ b b₁ b₂ c x : α} @[simp, aesop safe apply (rule_sets := [finsetNonempty])] theorem nonempty_Icc : (Icc a b).Nonempty ↔ a ≤ b := by rw [← coe_nonempty, coe_Icc, Set.nonempty_Icc] #align finset.nonempty_Icc Finset.nonempty_Icc @[simp, aesop safe apply (rule_sets := [finsetNonempty])] theorem nonempty_Ico : (Ico a b).Nonempty ↔ a < b := by rw [← coe_nonempty, coe_Ico, Set.nonempty_Ico] #align finset.nonempty_Ico Finset.nonempty_Ico @[simp, aesop safe apply (rule_sets := [finsetNonempty])] theorem nonempty_Ioc : (Ioc a b).Nonempty ↔ a < b := by rw [← coe_nonempty, coe_Ioc, Set.nonempty_Ioc] #align finset.nonempty_Ioc Finset.nonempty_Ioc -- TODO: This is nonsense. A locally finite order is never densely ordered @[simp] theorem nonempty_Ioo [DenselyOrdered α] : (Ioo a b).Nonempty ↔ a < b := by rw [← coe_nonempty, coe_Ioo, Set.nonempty_Ioo] #align finset.nonempty_Ioo Finset.nonempty_Ioo @[simp] theorem Icc_eq_empty_iff : Icc a b = ∅ ↔ ¬a ≤ b := by rw [← coe_eq_empty, coe_Icc, Set.Icc_eq_empty_iff] #align finset.Icc_eq_empty_iff Finset.Icc_eq_empty_iff @[simp] theorem Ico_eq_empty_iff : Ico a b = ∅ ↔ ¬a < b := by rw [← coe_eq_empty, coe_Ico, Set.Ico_eq_empty_iff] #align finset.Ico_eq_empty_iff Finset.Ico_eq_empty_iff @[simp] theorem Ioc_eq_empty_iff : Ioc a b = ∅ ↔ ¬a < b := by rw [← coe_eq_empty, coe_Ioc, Set.Ioc_eq_empty_iff] #align finset.Ioc_eq_empty_iff Finset.Ioc_eq_empty_iff -- TODO: This is nonsense. A locally finite order is never densely ordered @[simp] theorem Ioo_eq_empty_iff [DenselyOrdered α] : Ioo a b = ∅ ↔ ¬a < b := by rw [← coe_eq_empty, coe_Ioo, Set.Ioo_eq_empty_iff] #align finset.Ioo_eq_empty_iff Finset.Ioo_eq_empty_iff alias ⟨_, Icc_eq_empty⟩ := Icc_eq_empty_iff #align finset.Icc_eq_empty Finset.Icc_eq_empty alias ⟨_, Ico_eq_empty⟩ := Ico_eq_empty_iff #align finset.Ico_eq_empty Finset.Ico_eq_empty alias ⟨_, Ioc_eq_empty⟩ := Ioc_eq_empty_iff #align finset.Ioc_eq_empty Finset.Ioc_eq_empty @[simp] theorem Ioo_eq_empty (h : ¬a < b) : Ioo a b = ∅ := eq_empty_iff_forall_not_mem.2 fun _ hx => h ((mem_Ioo.1 hx).1.trans (mem_Ioo.1 hx).2) #align finset.Ioo_eq_empty Finset.Ioo_eq_empty @[simp] theorem Icc_eq_empty_of_lt (h : b < a) : Icc a b = ∅ := Icc_eq_empty h.not_le #align finset.Icc_eq_empty_of_lt Finset.Icc_eq_empty_of_lt @[simp] theorem Ico_eq_empty_of_le (h : b ≤ a) : Ico a b = ∅ := Ico_eq_empty h.not_lt #align finset.Ico_eq_empty_of_le Finset.Ico_eq_empty_of_le @[simp] theorem Ioc_eq_empty_of_le (h : b ≤ a) : Ioc a b = ∅ := Ioc_eq_empty h.not_lt #align finset.Ioc_eq_empty_of_le Finset.Ioc_eq_empty_of_le @[simp] theorem Ioo_eq_empty_of_le (h : b ≤ a) : Ioo a b = ∅ := Ioo_eq_empty h.not_lt #align finset.Ioo_eq_empty_of_le Finset.Ioo_eq_empty_of_le -- porting note (#10618): simp can prove this -- @[simp] theorem left_mem_Icc : a ∈ Icc a b ↔ a ≤ b := by simp only [mem_Icc, true_and_iff, le_rfl] #align finset.left_mem_Icc Finset.left_mem_Icc -- porting note (#10618): simp can prove this -- @[simp] theorem left_mem_Ico : a ∈ Ico a b ↔ a < b := by simp only [mem_Ico, true_and_iff, le_refl] #align finset.left_mem_Ico Finset.left_mem_Ico -- porting note (#10618): simp can prove this -- @[simp] theorem right_mem_Icc : b ∈ Icc a b ↔ a ≤ b := by simp only [mem_Icc, and_true_iff, le_rfl] #align finset.right_mem_Icc Finset.right_mem_Icc -- porting note (#10618): simp can prove this -- @[simp] theorem right_mem_Ioc : b ∈ Ioc a b ↔ a < b := by simp only [mem_Ioc, and_true_iff, le_rfl] #align finset.right_mem_Ioc Finset.right_mem_Ioc -- porting note (#10618): simp can prove this -- @[simp] theorem left_not_mem_Ioc : a ∉ Ioc a b := fun h => lt_irrefl _ (mem_Ioc.1 h).1 #align finset.left_not_mem_Ioc Finset.left_not_mem_Ioc -- porting note (#10618): simp can prove this -- @[simp] theorem left_not_mem_Ioo : a ∉ Ioo a b := fun h => lt_irrefl _ (mem_Ioo.1 h).1 #align finset.left_not_mem_Ioo Finset.left_not_mem_Ioo -- porting note (#10618): simp can prove this -- @[simp] theorem right_not_mem_Ico : b ∉ Ico a b := fun h => lt_irrefl _ (mem_Ico.1 h).2 #align finset.right_not_mem_Ico Finset.right_not_mem_Ico -- porting note (#10618): simp can prove this -- @[simp] theorem right_not_mem_Ioo : b ∉ Ioo a b := fun h => lt_irrefl _ (mem_Ioo.1 h).2 #align finset.right_not_mem_Ioo Finset.right_not_mem_Ioo theorem Icc_subset_Icc (ha : a₂ ≤ a₁) (hb : b₁ ≤ b₂) : Icc a₁ b₁ ⊆ Icc a₂ b₂ := by simpa [← coe_subset] using Set.Icc_subset_Icc ha hb #align finset.Icc_subset_Icc Finset.Icc_subset_Icc theorem Ico_subset_Ico (ha : a₂ ≤ a₁) (hb : b₁ ≤ b₂) : Ico a₁ b₁ ⊆ Ico a₂ b₂ := by simpa [← coe_subset] using Set.Ico_subset_Ico ha hb #align finset.Ico_subset_Ico Finset.Ico_subset_Ico theorem Ioc_subset_Ioc (ha : a₂ ≤ a₁) (hb : b₁ ≤ b₂) : Ioc a₁ b₁ ⊆ Ioc a₂ b₂ := by simpa [← coe_subset] using Set.Ioc_subset_Ioc ha hb #align finset.Ioc_subset_Ioc Finset.Ioc_subset_Ioc theorem Ioo_subset_Ioo (ha : a₂ ≤ a₁) (hb : b₁ ≤ b₂) : Ioo a₁ b₁ ⊆ Ioo a₂ b₂ := by simpa [← coe_subset] using Set.Ioo_subset_Ioo ha hb #align finset.Ioo_subset_Ioo Finset.Ioo_subset_Ioo theorem Icc_subset_Icc_left (h : a₁ ≤ a₂) : Icc a₂ b ⊆ Icc a₁ b := Icc_subset_Icc h le_rfl #align finset.Icc_subset_Icc_left Finset.Icc_subset_Icc_left theorem Ico_subset_Ico_left (h : a₁ ≤ a₂) : Ico a₂ b ⊆ Ico a₁ b := Ico_subset_Ico h le_rfl #align finset.Ico_subset_Ico_left Finset.Ico_subset_Ico_left theorem Ioc_subset_Ioc_left (h : a₁ ≤ a₂) : Ioc a₂ b ⊆ Ioc a₁ b := Ioc_subset_Ioc h le_rfl #align finset.Ioc_subset_Ioc_left Finset.Ioc_subset_Ioc_left theorem Ioo_subset_Ioo_left (h : a₁ ≤ a₂) : Ioo a₂ b ⊆ Ioo a₁ b := Ioo_subset_Ioo h le_rfl #align finset.Ioo_subset_Ioo_left Finset.Ioo_subset_Ioo_left theorem Icc_subset_Icc_right (h : b₁ ≤ b₂) : Icc a b₁ ⊆ Icc a b₂ := Icc_subset_Icc le_rfl h #align finset.Icc_subset_Icc_right Finset.Icc_subset_Icc_right theorem Ico_subset_Ico_right (h : b₁ ≤ b₂) : Ico a b₁ ⊆ Ico a b₂ := Ico_subset_Ico le_rfl h #align finset.Ico_subset_Ico_right Finset.Ico_subset_Ico_right theorem Ioc_subset_Ioc_right (h : b₁ ≤ b₂) : Ioc a b₁ ⊆ Ioc a b₂ := Ioc_subset_Ioc le_rfl h #align finset.Ioc_subset_Ioc_right Finset.Ioc_subset_Ioc_right theorem Ioo_subset_Ioo_right (h : b₁ ≤ b₂) : Ioo a b₁ ⊆ Ioo a b₂ := Ioo_subset_Ioo le_rfl h #align finset.Ioo_subset_Ioo_right Finset.Ioo_subset_Ioo_right theorem Ico_subset_Ioo_left (h : a₁ < a₂) : Ico a₂ b ⊆ Ioo a₁ b := by rw [← coe_subset, coe_Ico, coe_Ioo] exact Set.Ico_subset_Ioo_left h #align finset.Ico_subset_Ioo_left Finset.Ico_subset_Ioo_left theorem Ioc_subset_Ioo_right (h : b₁ < b₂) : Ioc a b₁ ⊆ Ioo a b₂ := by rw [← coe_subset, coe_Ioc, coe_Ioo] exact Set.Ioc_subset_Ioo_right h #align finset.Ioc_subset_Ioo_right Finset.Ioc_subset_Ioo_right theorem Icc_subset_Ico_right (h : b₁ < b₂) : Icc a b₁ ⊆ Ico a b₂ := by rw [← coe_subset, coe_Icc, coe_Ico] exact Set.Icc_subset_Ico_right h #align finset.Icc_subset_Ico_right Finset.Icc_subset_Ico_right theorem Ioo_subset_Ico_self : Ioo a b ⊆ Ico a b := by rw [← coe_subset, coe_Ioo, coe_Ico] exact Set.Ioo_subset_Ico_self #align finset.Ioo_subset_Ico_self Finset.Ioo_subset_Ico_self theorem Ioo_subset_Ioc_self : Ioo a b ⊆ Ioc a b := by rw [← coe_subset, coe_Ioo, coe_Ioc] exact Set.Ioo_subset_Ioc_self #align finset.Ioo_subset_Ioc_self Finset.Ioo_subset_Ioc_self theorem Ico_subset_Icc_self : Ico a b ⊆ Icc a b := by rw [← coe_subset, coe_Ico, coe_Icc] exact Set.Ico_subset_Icc_self #align finset.Ico_subset_Icc_self Finset.Ico_subset_Icc_self theorem Ioc_subset_Icc_self : Ioc a b ⊆ Icc a b := by rw [← coe_subset, coe_Ioc, coe_Icc] exact Set.Ioc_subset_Icc_self #align finset.Ioc_subset_Icc_self Finset.Ioc_subset_Icc_self theorem Ioo_subset_Icc_self : Ioo a b ⊆ Icc a b := Ioo_subset_Ico_self.trans Ico_subset_Icc_self #align finset.Ioo_subset_Icc_self Finset.Ioo_subset_Icc_self theorem Icc_subset_Icc_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Icc a₂ b₂ ↔ a₂ ≤ a₁ ∧ b₁ ≤ b₂ := by rw [← coe_subset, coe_Icc, coe_Icc, Set.Icc_subset_Icc_iff h₁] #align finset.Icc_subset_Icc_iff Finset.Icc_subset_Icc_iff theorem Icc_subset_Ioo_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Ioo a₂ b₂ ↔ a₂ < a₁ ∧ b₁ < b₂ := by rw [← coe_subset, coe_Icc, coe_Ioo, Set.Icc_subset_Ioo_iff h₁] #align finset.Icc_subset_Ioo_iff Finset.Icc_subset_Ioo_iff theorem Icc_subset_Ico_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Ico a₂ b₂ ↔ a₂ ≤ a₁ ∧ b₁ < b₂ := by rw [← coe_subset, coe_Icc, coe_Ico, Set.Icc_subset_Ico_iff h₁] #align finset.Icc_subset_Ico_iff Finset.Icc_subset_Ico_iff theorem Icc_subset_Ioc_iff (h₁ : a₁ ≤ b₁) : Icc a₁ b₁ ⊆ Ioc a₂ b₂ ↔ a₂ < a₁ ∧ b₁ ≤ b₂ := (Icc_subset_Ico_iff h₁.dual).trans and_comm #align finset.Icc_subset_Ioc_iff Finset.Icc_subset_Ioc_iff --TODO: `Ico_subset_Ioo_iff`, `Ioc_subset_Ioo_iff` theorem Icc_ssubset_Icc_left (hI : a₂ ≤ b₂) (ha : a₂ < a₁) (hb : b₁ ≤ b₂) : Icc a₁ b₁ ⊂ Icc a₂ b₂ := by rw [← coe_ssubset, coe_Icc, coe_Icc] exact Set.Icc_ssubset_Icc_left hI ha hb #align finset.Icc_ssubset_Icc_left Finset.Icc_ssubset_Icc_left theorem Icc_ssubset_Icc_right (hI : a₂ ≤ b₂) (ha : a₂ ≤ a₁) (hb : b₁ < b₂) : Icc a₁ b₁ ⊂ Icc a₂ b₂ := by rw [← coe_ssubset, coe_Icc, coe_Icc] exact Set.Icc_ssubset_Icc_right hI ha hb #align finset.Icc_ssubset_Icc_right Finset.Icc_ssubset_Icc_right variable (a) -- porting note (#10618): simp can prove this -- @[simp] theorem Ico_self : Ico a a = ∅ := Ico_eq_empty <\| lt_irrefl _ #align finset.Ico_self Finset.Ico_self -- porting note (#10618): simp can prove this -- @[simp] theorem Ioc_self : Ioc a a = ∅ := Ioc_eq_empty <\| lt_irrefl _ #align finset.Ioc_self Finset.Ioc_self -- porting note (#10618): simp can prove this -- @[simp] theorem Ioo_self : Ioo a a = ∅ := Ioo_eq_empty <\| lt_irrefl _ #align finset.Ioo_self Finset.Ioo_self variable {a} def _root_.Set.fintypeOfMemBounds {s : Set α} [DecidablePred (· ∈ s)] (ha : a ∈ lowerBounds s) (hb : b ∈ upperBounds s) : Fintype s := Set.fintypeSubset (Set.Icc a b) fun _ hx => ⟨ha hx, hb hx⟩ #align set.fintype_of_mem_bounds Set.fintypeOfMemBounds section PartialOrder variable [PartialOrder α] [LocallyFiniteOrder α] {a b c : α} @[simp] theorem Icc_self (a : α) : Icc a a = {a} := by rw [← coe_eq_singleton, coe_Icc, Set.Icc_self] #align finset.Icc_self Finset.Icc_self @[simp] theorem Icc_eq_singleton_iff : Icc a b = {c} ↔ a = c ∧ b = c := by rw [← coe_eq_singleton, coe_Icc, Set.Icc_eq_singleton_iff] #align finset.Icc_eq_singleton_iff Finset.Icc_eq_singleton_iff theorem Ico_disjoint_Ico_consecutive (a b c : α) : Disjoint (Ico a b) (Ico b c) := disjoint_left.2 fun _ hab hbc => (mem_Ico.mp hab).2.not_le (mem_Ico.mp hbc).1 #align finset.Ico_disjoint_Ico_consecutive Finset.Ico_disjoint_Ico_consecutive section BoundedPartialOrder variable [PartialOrder α] section Lattice variable [Lattice α] [LocallyFiniteOrder α] {a a₁ a₂ b b₁ b₂ c x : α} theorem uIcc_toDual (a b : α) : [[toDual a, toDual b]] = [[a, b]].map toDual.toEmbedding := Icc_toDual _ _ #align finset.uIcc_to_dual Finset.uIcc_toDual @[simp] theorem uIcc_of_le (h : a ≤ b) : [[a, b]] = Icc a b := by rw [uIcc, inf_eq_left.2 h, sup_eq_right.2 h] #align finset.uIcc_of_le Finset.uIcc_of_le @[simp] theorem uIcc_of_ge (h : b ≤ a) : [[a, b]] = Icc b a := by rw [uIcc, inf_eq_right.2 h, sup_eq_left.2 h] #align finset.uIcc_of_ge Finset.uIcc_of_ge theorem uIcc_comm (a b : α) : [[a, b]] = [[b, a]] := by rw [uIcc, uIcc, inf_comm, sup_comm] #align finset.uIcc_comm Finset.uIcc_comm -- porting note (#10618): simp can prove this -- @[simp] theorem uIcc_self : [[a, a]] = {a} := by simp [uIcc] #align finset.uIcc_self Finset.uIcc_self @[simp] theorem nonempty_uIcc : Finset.Nonempty [[a, b]] := nonempty_Icc.2 inf_le_sup #align finset.nonempty_uIcc Finset.nonempty_uIcc theorem Icc_subset_uIcc : Icc a b ⊆ [[a, b]] := Icc_subset_Icc inf_le_left le_sup_right #align finset.Icc_subset_uIcc Finset.Icc_subset_uIcc theorem Icc_subset_uIcc' : Icc b a ⊆ [[a, b]] := Icc_subset_Icc inf_le_right le_sup_left #align finset.Icc_subset_uIcc' Finset.Icc_subset_uIcc' -- porting note (#10618): simp can prove this -- @[simp] theorem left_mem_uIcc : a ∈ [[a, b]] := mem_Icc.2 ⟨inf_le_left, le_sup_left⟩ #align finset.left_mem_uIcc Finset.left_mem_uIcc -- porting note (#10618): simp can prove this -- @[simp] theorem right_mem_uIcc : b ∈ [[a, b]] := mem_Icc.2 ⟨inf_le_right, le_sup_right⟩ #align finset.right_mem_uIcc Finset.right_mem_uIcc theorem mem_uIcc_of_le (ha : a ≤ x) (hb : x ≤ b) : x ∈ [[a, b]] := Icc_subset_uIcc <\| mem_Icc.2 ⟨ha, hb⟩ #align finset.mem_uIcc_of_le Finset.mem_uIcc_of_le theorem mem_uIcc_of_ge (hb : b ≤ x) (ha : x ≤ a) : x ∈ [[a, b]] := Icc_subset_uIcc' <\| mem_Icc.2 ⟨hb, ha⟩ #align finset.mem_uIcc_of_ge Finset.mem_uIcc_of_ge theorem uIcc_subset_uIcc (h₁ : a₁ ∈ [[a₂, b₂]]) (h₂ : b₁ ∈ [[a₂, b₂]]) : [[a₁, b₁]] ⊆ [[a₂, b₂]] := by rw [mem_uIcc] at h₁ h₂ exact Icc_subset_Icc (_root_.le_inf h₁.1 h₂.1) (_root_.sup_le h₁.2 h₂.2) #align finset.uIcc_subset_uIcc Finset.uIcc_subset_uIcc	Mathlib/Order/Interval/Finset/Basic.lean	972	974	theorem uIcc_subset_Icc (ha : a₁ ∈ Icc a₂ b₂) (hb : b₁ ∈ Icc a₂ b₂) : [[a₁, b₁]] ⊆ Icc a₂ b₂ := by	rw [mem_Icc] at ha hb exact Icc_subset_Icc (_root_.le_inf ha.1 hb.1) (_root_.sup_le ha.2 hb.2)
import Mathlib.Algebra.Group.Pi.Lemmas import Mathlib.Topology.Algebra.Monoid import Mathlib.Topology.Homeomorph #align_import topology.algebra.group_with_zero from "leanprover-community/mathlib"@"c10e724be91096453ee3db13862b9fb9a992fef2" open Topology Filter Function variable {α β G₀ : Type*} section DivConst variable [DivInvMonoid G₀] [TopologicalSpace G₀] [ContinuousMul G₀] {f : α → G₀} {s : Set α} {l : Filter α} theorem Filter.Tendsto.div_const {x : G₀} (hf : Tendsto f l (𝓝 x)) (y : G₀) : Tendsto (fun a => f a / y) l (𝓝 (x / y)) := by simpa only [div_eq_mul_inv] using hf.mul tendsto_const_nhds #align filter.tendsto.div_const Filter.Tendsto.div_const variable [TopologicalSpace α] nonrec theorem ContinuousAt.div_const {a : α} (hf : ContinuousAt f a) (y : G₀) : ContinuousAt (fun x => f x / y) a := hf.div_const y #align continuous_at.div_const ContinuousAt.div_const nonrec theorem ContinuousWithinAt.div_const {a} (hf : ContinuousWithinAt f s a) (y : G₀) : ContinuousWithinAt (fun x => f x / y) s a := hf.div_const _ #align continuous_within_at.div_const ContinuousWithinAt.div_const	Mathlib/Topology/Algebra/GroupWithZero.lean	69	71	theorem ContinuousOn.div_const (hf : ContinuousOn f s) (y : G₀) : ContinuousOn (fun x => f x / y) s := by	simpa only [div_eq_mul_inv] using hf.mul continuousOn_const
import Mathlib.Data.Finsupp.Encodable import Mathlib.LinearAlgebra.Pi import Mathlib.LinearAlgebra.Span import Mathlib.Data.Set.Countable #align_import linear_algebra.finsupp from "leanprover-community/mathlib"@"9d684a893c52e1d6692a504a118bfccbae04feeb" noncomputable section open Set LinearMap Submodule namespace Finsupp variable {α : Type} {M : Type} {N : Type} {P : Type} {R : Type} {S : Type} variable [Semiring R] [Semiring S] [AddCommMonoid M] [Module R M] variable [AddCommMonoid N] [Module R N] variable [AddCommMonoid P] [Module R P] def lsingle (a : α) : M →ₗ[R] α →₀ M := { Finsupp.singleAddHom a with map_smul' := fun _ _ => (smul_single _ _ _).symm } #align finsupp.lsingle Finsupp.lsingle theorem lhom_ext ⦃φ ψ : (α →₀ M) →ₗ[R] N⦄ (h : ∀ a b, φ (single a b) = ψ (single a b)) : φ = ψ := LinearMap.toAddMonoidHom_injective <\| addHom_ext h #align finsupp.lhom_ext Finsupp.lhom_ext -- Porting note: The priority should be higher than `LinearMap.ext`. @[ext high] theorem lhom_ext' ⦃φ ψ : (α →₀ M) →ₗ[R] N⦄ (h : ∀ a, φ.comp (lsingle a) = ψ.comp (lsingle a)) : φ = ψ := lhom_ext fun a => LinearMap.congr_fun (h a) #align finsupp.lhom_ext' Finsupp.lhom_ext' def lapply (a : α) : (α →₀ M) →ₗ[R] M := { Finsupp.applyAddHom a with map_smul' := fun _ _ => rfl } #align finsupp.lapply Finsupp.lapply @[simps] def lcoeFun : (α →₀ M) →ₗ[R] α → M where toFun := (⇑) map_add' x y := by ext simp map_smul' x y := by ext simp #align finsupp.lcoe_fun Finsupp.lcoeFun @[simp] theorem lsingle_apply (a : α) (b : M) : (lsingle a : M →ₗ[R] α →₀ M) b = single a b := rfl #align finsupp.lsingle_apply Finsupp.lsingle_apply @[simp] theorem lapply_apply (a : α) (f : α →₀ M) : (lapply a : (α →₀ M) →ₗ[R] M) f = f a := rfl #align finsupp.lapply_apply Finsupp.lapply_apply @[simp] theorem lapply_comp_lsingle_same (a : α) : lapply a ∘ₗ lsingle a = (.id : M →ₗ[R] M) := by ext; simp @[simp] theorem lapply_comp_lsingle_of_ne (a a' : α) (h : a ≠ a') : lapply a ∘ₗ lsingle a' = (0 : M →ₗ[R] M) := by ext; simp [h.symm] @[simp] theorem ker_lsingle (a : α) : ker (lsingle a : M →ₗ[R] α →₀ M) = ⊥ := ker_eq_bot_of_injective (single_injective a) #align finsupp.ker_lsingle Finsupp.ker_lsingle theorem lsingle_range_le_ker_lapply (s t : Set α) (h : Disjoint s t) : ⨆ a ∈ s, LinearMap.range (lsingle a : M →ₗ[R] α →₀ M) ≤ ⨅ a ∈ t, ker (lapply a : (α →₀ M) →ₗ[R] M) := by refine iSup_le fun a₁ => iSup_le fun h₁ => range_le_iff_comap.2 ?_ simp only [(ker_comp _ _).symm, eq_top_iff, SetLike.le_def, mem_ker, comap_iInf, mem_iInf] intro b _ a₂ h₂ have : a₁ ≠ a₂ := fun eq => h.le_bot ⟨h₁, eq.symm ▸ h₂⟩ exact single_eq_of_ne this #align finsupp.lsingle_range_le_ker_lapply Finsupp.lsingle_range_le_ker_lapply theorem iInf_ker_lapply_le_bot : ⨅ a, ker (lapply a : (α →₀ M) →ₗ[R] M) ≤ ⊥ := by simp only [SetLike.le_def, mem_iInf, mem_ker, mem_bot, lapply_apply] exact fun a h => Finsupp.ext h #align finsupp.infi_ker_lapply_le_bot Finsupp.iInf_ker_lapply_le_bot theorem iSup_lsingle_range : ⨆ a, LinearMap.range (lsingle a : M →ₗ[R] α →₀ M) = ⊤ := by refine eq_top_iff.2 <\| SetLike.le_def.2 fun f _ => ?_ rw [← sum_single f] exact sum_mem fun a _ => Submodule.mem_iSup_of_mem a ⟨_, rfl⟩ #align finsupp.supr_lsingle_range Finsupp.iSup_lsingle_range theorem disjoint_lsingle_lsingle (s t : Set α) (hs : Disjoint s t) : Disjoint (⨆ a ∈ s, LinearMap.range (lsingle a : M →ₗ[R] α →₀ M)) (⨆ a ∈ t, LinearMap.range (lsingle a : M →ₗ[R] α →₀ M)) := by -- Porting note: 2 placeholders are added to prevent timeout. refine (Disjoint.mono (lsingle_range_le_ker_lapply s sᶜ ?_) (lsingle_range_le_ker_lapply t tᶜ ?_)) ?_ · apply disjoint_compl_right · apply disjoint_compl_right rw [disjoint_iff_inf_le] refine le_trans (le_iInf fun i => ?_) iInf_ker_lapply_le_bot classical by_cases his : i ∈ s · by_cases hit : i ∈ t · exact (hs.le_bot ⟨his, hit⟩).elim exact inf_le_of_right_le (iInf_le_of_le i <\| iInf_le _ hit) exact inf_le_of_left_le (iInf_le_of_le i <\| iInf_le _ his) #align finsupp.disjoint_lsingle_lsingle Finsupp.disjoint_lsingle_lsingle theorem span_single_image (s : Set M) (a : α) : Submodule.span R (single a '' s) = (Submodule.span R s).map (lsingle a : M →ₗ[R] α →₀ M) := by rw [← span_image]; rfl #align finsupp.span_single_image Finsupp.span_single_image variable (M R) def supported (s : Set α) : Submodule R (α →₀ M) where carrier := { p \| ↑p.support ⊆ s } add_mem' {p q} hp hq := by classical refine Subset.trans (Subset.trans (Finset.coe_subset.2 support_add) ?_) (union_subset hp hq) rw [Finset.coe_union] zero_mem' := by simp only [subset_def, Finset.mem_coe, Set.mem_setOf_eq, mem_support_iff, zero_apply] intro h ha exact (ha rfl).elim smul_mem' a p hp := Subset.trans (Finset.coe_subset.2 support_smul) hp #align finsupp.supported Finsupp.supported variable {M} theorem mem_supported {s : Set α} (p : α →₀ M) : p ∈ supported M R s ↔ ↑p.support ⊆ s := Iff.rfl #align finsupp.mem_supported Finsupp.mem_supported theorem mem_supported' {s : Set α} (p : α →₀ M) : p ∈ supported M R s ↔ ∀ x ∉ s, p x = 0 := by haveI := Classical.decPred fun x : α => x ∈ s; simp [mem_supported, Set.subset_def, not_imp_comm] #align finsupp.mem_supported' Finsupp.mem_supported' theorem mem_supported_support (p : α →₀ M) : p ∈ Finsupp.supported M R (p.support : Set α) := by rw [Finsupp.mem_supported] #align finsupp.mem_supported_support Finsupp.mem_supported_support theorem single_mem_supported {s : Set α} {a : α} (b : M) (h : a ∈ s) : single a b ∈ supported M R s := Set.Subset.trans support_single_subset (Finset.singleton_subset_set_iff.2 h) #align finsupp.single_mem_supported Finsupp.single_mem_supported theorem supported_eq_span_single (s : Set α) : supported R R s = span R ((fun i => single i 1) '' s) := by refine (span_eq_of_le _ ?_ (SetLike.le_def.2 fun l hl => ?_)).symm · rintro _ ⟨_, hp, rfl⟩ exact single_mem_supported R 1 hp · rw [← l.sum_single] refine sum_mem fun i il => ?_ -- Porting note: Needed to help this convert quite a bit replacing underscores convert smul_mem (M := α →₀ R) (x := single i 1) (span R ((fun i => single i 1) '' s)) (l i) ?_ · simp [span] · apply subset_span apply Set.mem_image_of_mem _ (hl il) #align finsupp.supported_eq_span_single Finsupp.supported_eq_span_single variable (M) def restrictDom (s : Set α) [DecidablePred (· ∈ s)] : (α →₀ M) →ₗ[R] supported M R s := LinearMap.codRestrict _ { toFun := filter (· ∈ s) map_add' := fun _ _ => filter_add map_smul' := fun _ _ => filter_smul } fun l => (mem_supported' _ _).2 fun _ => filter_apply_neg (· ∈ s) l #align finsupp.restrict_dom Finsupp.restrictDom variable {M R} section @[simp] theorem restrictDom_apply (s : Set α) (l : α →₀ M) [DecidablePred (· ∈ s)]: (restrictDom M R s l : α →₀ M) = Finsupp.filter (· ∈ s) l := rfl #align finsupp.restrict_dom_apply Finsupp.restrictDom_apply end theorem restrictDom_comp_subtype (s : Set α) [DecidablePred (· ∈ s)] : (restrictDom M R s).comp (Submodule.subtype _) = LinearMap.id := by ext l a by_cases h : a ∈ s <;> simp [h] exact ((mem_supported' R l.1).1 l.2 a h).symm #align finsupp.restrict_dom_comp_subtype Finsupp.restrictDom_comp_subtype theorem range_restrictDom (s : Set α) [DecidablePred (· ∈ s)] : LinearMap.range (restrictDom M R s) = ⊤ := range_eq_top.2 <\| Function.RightInverse.surjective <\| LinearMap.congr_fun (restrictDom_comp_subtype s) #align finsupp.range_restrict_dom Finsupp.range_restrictDom theorem supported_mono {s t : Set α} (st : s ⊆ t) : supported M R s ≤ supported M R t := fun _ h => Set.Subset.trans h st #align finsupp.supported_mono Finsupp.supported_mono @[simp] theorem supported_empty : supported M R (∅ : Set α) = ⊥ := eq_bot_iff.2 fun l h => (Submodule.mem_bot R).2 <\| by ext; simp_all [mem_supported'] #align finsupp.supported_empty Finsupp.supported_empty @[simp] theorem supported_univ : supported M R (Set.univ : Set α) = ⊤ := eq_top_iff.2 fun _ _ => Set.subset_univ _ #align finsupp.supported_univ Finsupp.supported_univ theorem supported_iUnion {δ : Type} (s : δ → Set α) : supported M R (⋃ i, s i) = ⨆ i, supported M R (s i) := by refine le_antisymm ?_ (iSup_le fun i => supported_mono <\| Set.subset_iUnion _ _) haveI := Classical.decPred fun x => x ∈ ⋃ i, s i suffices LinearMap.range ((Submodule.subtype _).comp (restrictDom M R (⋃ i, s i))) ≤ ⨆ i, supported M R (s i) by rwa [LinearMap.range_comp, range_restrictDom, Submodule.map_top, range_subtype] at this rw [range_le_iff_comap, eq_top_iff] rintro l ⟨⟩ -- Porting note: Was ported as `induction l using Finsupp.induction` refine Finsupp.induction l ?_ ?_ · exact zero_mem _ · refine fun x a l _ _ => add_mem ?_ by_cases h : ∃ i, x ∈ s i <;> simp [h] cases' h with i hi exact le_iSup (fun i => supported M R (s i)) i (single_mem_supported R _ hi) #align finsupp.supported_Union Finsupp.supported_iUnion theorem supported_union (s t : Set α) : supported M R (s ∪ t) = supported M R s ⊔ supported M R t := by erw [Set.union_eq_iUnion, supported_iUnion, iSup_bool_eq]; rfl #align finsupp.supported_union Finsupp.supported_union theorem supported_iInter {ι : Type} (s : ι → Set α) : supported M R (⋂ i, s i) = ⨅ i, supported M R (s i) := Submodule.ext fun x => by simp [mem_supported, subset_iInter_iff] #align finsupp.supported_Inter Finsupp.supported_iInter theorem supported_inter (s t : Set α) : supported M R (s ∩ t) = supported M R s ⊓ supported M R t := by rw [Set.inter_eq_iInter, supported_iInter, iInf_bool_eq]; rfl #align finsupp.supported_inter Finsupp.supported_inter theorem disjoint_supported_supported {s t : Set α} (h : Disjoint s t) : Disjoint (supported M R s) (supported M R t) := disjoint_iff.2 <\| by rw [← supported_inter, disjoint_iff_inter_eq_empty.1 h, supported_empty] #align finsupp.disjoint_supported_supported Finsupp.disjoint_supported_supported theorem disjoint_supported_supported_iff [Nontrivial M] {s t : Set α} : Disjoint (supported M R s) (supported M R t) ↔ Disjoint s t := by refine ⟨fun h => Set.disjoint_left.mpr fun x hx1 hx2 => ?_, disjoint_supported_supported⟩ rcases exists_ne (0 : M) with ⟨y, hy⟩ have := h.le_bot ⟨single_mem_supported R y hx1, single_mem_supported R y hx2⟩ rw [mem_bot, single_eq_zero] at this exact hy this #align finsupp.disjoint_supported_supported_iff Finsupp.disjoint_supported_supported_iff def supportedEquivFinsupp (s : Set α) : supported M R s ≃ₗ[R] s →₀ M := by let F : supported M R s ≃ (s →₀ M) := restrictSupportEquiv s M refine F.toLinearEquiv ?_ have : (F : supported M R s → ↥s →₀ M) = (lsubtypeDomain s : (α →₀ M) →ₗ[R] s →₀ M).comp (Submodule.subtype (supported M R s)) := rfl rw [this] exact LinearMap.isLinear _ #align finsupp.supported_equiv_finsupp Finsupp.supportedEquivFinsupp section variable (M) (R) (X : Type) (S) variable [Module S M] [SMulCommClass R S M] noncomputable def lift : (X → M) ≃+ ((X →₀ R) →ₗ[R] M) := (AddEquiv.arrowCongr (Equiv.refl X) (ringLmapEquivSelf R ℕ M).toAddEquiv.symm).trans (lsum _ : _ ≃ₗ[ℕ] _).toAddEquiv #align finsupp.lift Finsupp.lift @[simp] theorem lift_symm_apply (f) (x) : ((lift M R X).symm f) x = f (single x 1) := rfl #align finsupp.lift_symm_apply Finsupp.lift_symm_apply @[simp] theorem lift_apply (f) (g) : ((lift M R X) f) g = g.sum fun x r => r • f x := rfl #align finsupp.lift_apply Finsupp.lift_apply noncomputable def llift : (X → M) ≃ₗ[S] (X →₀ R) →ₗ[R] M := { lift M R X with map_smul' := by intros dsimp ext simp only [coe_comp, Function.comp_apply, lsingle_apply, lift_apply, Pi.smul_apply, sum_single_index, zero_smul, one_smul, LinearMap.smul_apply] } #align finsupp.llift Finsupp.llift @[simp] theorem llift_apply (f : X → M) (x : X →₀ R) : llift M R S X f x = lift M R X f x := rfl #align finsupp.llift_apply Finsupp.llift_apply @[simp] theorem llift_symm_apply (f : (X →₀ R) →ₗ[R] M) (x : X) : (llift M R S X).symm f x = f (single x 1) := rfl #align finsupp.llift_symm_apply Finsupp.llift_symm_apply end section Total variable (α) (M) (R) variable {α' : Type} {M' : Type*} [AddCommMonoid M'] [Module R M'] (v : α → M) {v' : α' → M'} protected def total : (α →₀ R) →ₗ[R] M := Finsupp.lsum ℕ fun i => LinearMap.id.smulRight (v i) #align finsupp.total Finsupp.total variable {α M v} theorem total_apply (l : α →₀ R) : Finsupp.total α M R v l = l.sum fun i a => a • v i := rfl #align finsupp.total_apply Finsupp.total_apply theorem total_apply_of_mem_supported {l : α →₀ R} {s : Finset α} (hs : l ∈ supported R R (↑s : Set α)) : Finsupp.total α M R v l = s.sum fun i => l i • v i := Finset.sum_subset hs fun x _ hxg => show l x • v x = 0 by rw [not_mem_support_iff.1 hxg, zero_smul] #align finsupp.total_apply_of_mem_supported Finsupp.total_apply_of_mem_supported @[simp] theorem total_single (c : R) (a : α) : Finsupp.total α M R v (single a c) = c • v a := by simp [total_apply, sum_single_index] #align finsupp.total_single Finsupp.total_single theorem total_zero_apply (x : α →₀ R) : (Finsupp.total α M R 0) x = 0 := by simp [Finsupp.total_apply] #align finsupp.total_zero_apply Finsupp.total_zero_apply variable (α M) @[simp] theorem total_zero : Finsupp.total α M R 0 = 0 := LinearMap.ext (total_zero_apply R) #align finsupp.total_zero Finsupp.total_zero variable {α M} theorem apply_total (f : M →ₗ[R] M') (v) (l : α →₀ R) : f (Finsupp.total α M R v l) = Finsupp.total α M' R (f ∘ v) l := by apply Finsupp.induction_linear l <;> simp (config := { contextual := true }) #align finsupp.apply_total Finsupp.apply_total theorem apply_total_id (f : M →ₗ[R] M') (l : M →₀ R) : f (Finsupp.total M M R _root_.id l) = Finsupp.total M M' R f l := apply_total .. theorem total_unique [Unique α] (l : α →₀ R) (v) : Finsupp.total α M R v l = l default • v default := by rw [← total_single, ← unique_single l] #align finsupp.total_unique Finsupp.total_unique	Mathlib/LinearAlgebra/Finsupp.lean	705	709	theorem total_surjective (h : Function.Surjective v) : Function.Surjective (Finsupp.total α M R v) := by	intro x obtain ⟨y, hy⟩ := h x exact ⟨Finsupp.single y 1, by simp [hy]⟩
import Mathlib.Dynamics.Ergodic.MeasurePreserving import Mathlib.MeasureTheory.Function.SimpleFunc import Mathlib.MeasureTheory.Measure.MutuallySingular import Mathlib.MeasureTheory.Measure.Count import Mathlib.Topology.IndicatorConstPointwise import Mathlib.MeasureTheory.Constructions.BorelSpace.Real #align_import measure_theory.integral.lebesgue from "leanprover-community/mathlib"@"c14c8fcde993801fca8946b0d80131a1a81d1520" assert_not_exists NormedSpace set_option autoImplicit true noncomputable section open Set hiding restrict restrict_apply open Filter ENNReal open Function (support) open scoped Classical open Topology NNReal ENNReal MeasureTheory namespace MeasureTheory local infixr:25 " →ₛ " => SimpleFunc variable {α β γ δ : Type} section Lintegral open SimpleFunc variable {m : MeasurableSpace α} {μ ν : Measure α} irreducible_def lintegral {_ : MeasurableSpace α} (μ : Measure α) (f : α → ℝ≥0∞) : ℝ≥0∞ := ⨆ (g : α →ₛ ℝ≥0∞) (_ : ⇑g ≤ f), g.lintegral μ #align measure_theory.lintegral MeasureTheory.lintegral @[inherit_doc MeasureTheory.lintegral] notation3 "∫⁻ "(...)", "r:60:(scoped f => f)" ∂"μ:70 => lintegral μ r @[inherit_doc MeasureTheory.lintegral] notation3 "∫⁻ "(...)", "r:60:(scoped f => lintegral volume f) => r @[inherit_doc MeasureTheory.lintegral] notation3"∫⁻ "(...)" in "s", "r:60:(scoped f => f)" ∂"μ:70 => lintegral (Measure.restrict μ s) r @[inherit_doc MeasureTheory.lintegral] notation3"∫⁻ "(...)" in "s", "r:60:(scoped f => lintegral (Measure.restrict volume s) f) => r theorem SimpleFunc.lintegral_eq_lintegral {m : MeasurableSpace α} (f : α →ₛ ℝ≥0∞) (μ : Measure α) : ∫⁻ a, f a ∂μ = f.lintegral μ := by rw [MeasureTheory.lintegral] exact le_antisymm (iSup₂_le fun g hg => lintegral_mono hg <\| le_rfl) (le_iSup₂_of_le f le_rfl le_rfl) #align measure_theory.simple_func.lintegral_eq_lintegral MeasureTheory.SimpleFunc.lintegral_eq_lintegral @[mono] theorem lintegral_mono' {m : MeasurableSpace α} ⦃μ ν : Measure α⦄ (hμν : μ ≤ ν) ⦃f g : α → ℝ≥0∞⦄ (hfg : f ≤ g) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂ν := by rw [lintegral, lintegral] exact iSup_mono fun φ => iSup_mono' fun hφ => ⟨le_trans hφ hfg, lintegral_mono (le_refl φ) hμν⟩ #align measure_theory.lintegral_mono' MeasureTheory.lintegral_mono' -- workaround for the known eta-reduction issue with `@[gcongr]` @[gcongr] theorem lintegral_mono_fn' ⦃f g : α → ℝ≥0∞⦄ (hfg : ∀ x, f x ≤ g x) (h2 : μ ≤ ν) : lintegral μ f ≤ lintegral ν g := lintegral_mono' h2 hfg theorem lintegral_mono ⦃f g : α → ℝ≥0∞⦄ (hfg : f ≤ g) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂μ := lintegral_mono' (le_refl μ) hfg #align measure_theory.lintegral_mono MeasureTheory.lintegral_mono -- workaround for the known eta-reduction issue with `@[gcongr]` @[gcongr] theorem lintegral_mono_fn ⦃f g : α → ℝ≥0∞⦄ (hfg : ∀ x, f x ≤ g x) : lintegral μ f ≤ lintegral μ g := lintegral_mono hfg theorem lintegral_mono_nnreal {f g : α → ℝ≥0} (h : f ≤ g) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂μ := lintegral_mono fun a => ENNReal.coe_le_coe.2 (h a) #align measure_theory.lintegral_mono_nnreal MeasureTheory.lintegral_mono_nnreal theorem iSup_lintegral_measurable_le_eq_lintegral (f : α → ℝ≥0∞) : ⨆ (g : α → ℝ≥0∞) (_ : Measurable g) (_ : g ≤ f), ∫⁻ a, g a ∂μ = ∫⁻ a, f a ∂μ := by apply le_antisymm · exact iSup_le fun i => iSup_le fun _ => iSup_le fun h'i => lintegral_mono h'i · rw [lintegral] refine iSup₂_le fun i hi => le_iSup₂_of_le i i.measurable <\| le_iSup_of_le hi ?_ exact le_of_eq (i.lintegral_eq_lintegral _).symm #align measure_theory.supr_lintegral_measurable_le_eq_lintegral MeasureTheory.iSup_lintegral_measurable_le_eq_lintegral theorem lintegral_mono_set {_ : MeasurableSpace α} ⦃μ : Measure α⦄ {s t : Set α} {f : α → ℝ≥0∞} (hst : s ⊆ t) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in t, f x ∂μ := lintegral_mono' (Measure.restrict_mono hst (le_refl μ)) (le_refl f) #align measure_theory.lintegral_mono_set MeasureTheory.lintegral_mono_set theorem lintegral_mono_set' {_ : MeasurableSpace α} ⦃μ : Measure α⦄ {s t : Set α} {f : α → ℝ≥0∞} (hst : s ≤ᵐ[μ] t) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in t, f x ∂μ := lintegral_mono' (Measure.restrict_mono' hst (le_refl μ)) (le_refl f) #align measure_theory.lintegral_mono_set' MeasureTheory.lintegral_mono_set' theorem monotone_lintegral {_ : MeasurableSpace α} (μ : Measure α) : Monotone (lintegral μ) := lintegral_mono #align measure_theory.monotone_lintegral MeasureTheory.monotone_lintegral @[simp] theorem lintegral_const (c : ℝ≥0∞) : ∫⁻ _, c ∂μ = c μ univ := by rw [← SimpleFunc.const_lintegral, ← SimpleFunc.lintegral_eq_lintegral, SimpleFunc.coe_const] rfl #align measure_theory.lintegral_const MeasureTheory.lintegral_const theorem lintegral_zero : ∫⁻ _ : α, 0 ∂μ = 0 := by simp #align measure_theory.lintegral_zero MeasureTheory.lintegral_zero theorem lintegral_zero_fun : lintegral μ (0 : α → ℝ≥0∞) = 0 := lintegral_zero #align measure_theory.lintegral_zero_fun MeasureTheory.lintegral_zero_fun -- @[simp] -- Porting note (#10618): simp can prove this theorem lintegral_one : ∫⁻ _, (1 : ℝ≥0∞) ∂μ = μ univ := by rw [lintegral_const, one_mul] #align measure_theory.lintegral_one MeasureTheory.lintegral_one theorem set_lintegral_const (s : Set α) (c : ℝ≥0∞) : ∫⁻ _ in s, c ∂μ = c * μ s := by rw [lintegral_const, Measure.restrict_apply_univ] #align measure_theory.set_lintegral_const MeasureTheory.set_lintegral_const theorem set_lintegral_one (s) : ∫⁻ _ in s, 1 ∂μ = μ s := by rw [set_lintegral_const, one_mul] #align measure_theory.set_lintegral_one MeasureTheory.set_lintegral_one theorem set_lintegral_const_lt_top [IsFiniteMeasure μ] (s : Set α) {c : ℝ≥0∞} (hc : c ≠ ∞) : ∫⁻ _ in s, c ∂μ < ∞ := by rw [lintegral_const] exact ENNReal.mul_lt_top hc (measure_ne_top (μ.restrict s) univ) #align measure_theory.set_lintegral_const_lt_top MeasureTheory.set_lintegral_const_lt_top theorem lintegral_const_lt_top [IsFiniteMeasure μ] {c : ℝ≥0∞} (hc : c ≠ ∞) : ∫⁻ _, c ∂μ < ∞ := by simpa only [Measure.restrict_univ] using set_lintegral_const_lt_top (univ : Set α) hc #align measure_theory.lintegral_const_lt_top MeasureTheory.lintegral_const_lt_top section variable (μ) theorem exists_measurable_le_lintegral_eq (f : α → ℝ≥0∞) : ∃ g : α → ℝ≥0∞, Measurable g ∧ g ≤ f ∧ ∫⁻ a, f a ∂μ = ∫⁻ a, g a ∂μ := by rcases eq_or_ne (∫⁻ a, f a ∂μ) 0 with h₀ \| h₀ · exact ⟨0, measurable_zero, zero_le f, h₀.trans lintegral_zero.symm⟩ rcases exists_seq_strictMono_tendsto' h₀.bot_lt with ⟨L, _, hLf, hL_tendsto⟩ have : ∀ n, ∃ g : α → ℝ≥0∞, Measurable g ∧ g ≤ f ∧ L n < ∫⁻ a, g a ∂μ := by intro n simpa only [← iSup_lintegral_measurable_le_eq_lintegral f, lt_iSup_iff, exists_prop] using (hLf n).2 choose g hgm hgf hLg using this refine ⟨fun x => ⨆ n, g n x, measurable_iSup hgm, fun x => iSup_le fun n => hgf n x, le_antisymm ?_ ?_⟩ · refine le_of_tendsto' hL_tendsto fun n => (hLg n).le.trans <\| lintegral_mono fun x => ?_ exact le_iSup (fun n => g n x) n · exact lintegral_mono fun x => iSup_le fun n => hgf n x #align measure_theory.exists_measurable_le_lintegral_eq MeasureTheory.exists_measurable_le_lintegral_eq end theorem lintegral_eq_nnreal {m : MeasurableSpace α} (f : α → ℝ≥0∞) (μ : Measure α) : ∫⁻ a, f a ∂μ = ⨆ (φ : α →ₛ ℝ≥0) (_ : ∀ x, ↑(φ x) ≤ f x), (φ.map ((↑) : ℝ≥0 → ℝ≥0∞)).lintegral μ := by rw [lintegral] refine le_antisymm (iSup₂_le fun φ hφ => ?_) (iSup_mono' fun φ => ⟨φ.map ((↑) : ℝ≥0 → ℝ≥0∞), le_rfl⟩) by_cases h : ∀ᵐ a ∂μ, φ a ≠ ∞ · let ψ := φ.map ENNReal.toNNReal replace h : ψ.map ((↑) : ℝ≥0 → ℝ≥0∞) =ᵐ[μ] φ := h.mono fun a => ENNReal.coe_toNNReal have : ∀ x, ↑(ψ x) ≤ f x := fun x => le_trans ENNReal.coe_toNNReal_le_self (hφ x) exact le_iSup_of_le (φ.map ENNReal.toNNReal) (le_iSup_of_le this (ge_of_eq <\| lintegral_congr h)) · have h_meas : μ (φ ⁻¹' {∞}) ≠ 0 := mt measure_zero_iff_ae_nmem.1 h refine le_trans le_top (ge_of_eq <\| (iSup_eq_top _).2 fun b hb => ?_) obtain ⟨n, hn⟩ : ∃ n : ℕ, b < n * μ (φ ⁻¹' {∞}) := exists_nat_mul_gt h_meas (ne_of_lt hb) use (const α (n : ℝ≥0)).restrict (φ ⁻¹' {∞}) simp only [lt_iSup_iff, exists_prop, coe_restrict, φ.measurableSet_preimage, coe_const, ENNReal.coe_indicator, map_coe_ennreal_restrict, SimpleFunc.map_const, ENNReal.coe_natCast, restrict_const_lintegral] refine ⟨indicator_le fun x hx => le_trans ?_ (hφ _), hn⟩ simp only [mem_preimage, mem_singleton_iff] at hx simp only [hx, le_top] #align measure_theory.lintegral_eq_nnreal MeasureTheory.lintegral_eq_nnreal theorem exists_simpleFunc_forall_lintegral_sub_lt_of_pos {f : α → ℝ≥0∞} (h : ∫⁻ x, f x ∂μ ≠ ∞) {ε : ℝ≥0∞} (hε : ε ≠ 0) : ∃ φ : α →ₛ ℝ≥0, (∀ x, ↑(φ x) ≤ f x) ∧ ∀ ψ : α →ₛ ℝ≥0, (∀ x, ↑(ψ x) ≤ f x) → (map (↑) (ψ - φ)).lintegral μ < ε := by rw [lintegral_eq_nnreal] at h have := ENNReal.lt_add_right h hε erw [ENNReal.biSup_add] at this <;> [skip; exact ⟨0, fun x => zero_le _⟩] simp_rw [lt_iSup_iff, iSup_lt_iff, iSup_le_iff] at this rcases this with ⟨φ, hle : ∀ x, ↑(φ x) ≤ f x, b, hbφ, hb⟩ refine ⟨φ, hle, fun ψ hψ => ?_⟩ have : (map (↑) φ).lintegral μ ≠ ∞ := ne_top_of_le_ne_top h (by exact le_iSup₂ (α := ℝ≥0∞) φ hle) rw [← ENNReal.add_lt_add_iff_left this, ← add_lintegral, ← SimpleFunc.map_add @ENNReal.coe_add] refine (hb _ fun x => le_trans ?_ (max_le (hle x) (hψ x))).trans_lt hbφ norm_cast simp only [add_apply, sub_apply, add_tsub_eq_max] rfl #align measure_theory.exists_simple_func_forall_lintegral_sub_lt_of_pos MeasureTheory.exists_simpleFunc_forall_lintegral_sub_lt_of_pos theorem iSup_lintegral_le {ι : Sort} (f : ι → α → ℝ≥0∞) : ⨆ i, ∫⁻ a, f i a ∂μ ≤ ∫⁻ a, ⨆ i, f i a ∂μ := by simp only [← iSup_apply] exact (monotone_lintegral μ).le_map_iSup #align measure_theory.supr_lintegral_le MeasureTheory.iSup_lintegral_le theorem iSup₂_lintegral_le {ι : Sort} {ι' : ι → Sort} (f : ∀ i, ι' i → α → ℝ≥0∞) : ⨆ (i) (j), ∫⁻ a, f i j a ∂μ ≤ ∫⁻ a, ⨆ (i) (j), f i j a ∂μ := by convert (monotone_lintegral μ).le_map_iSup₂ f with a simp only [iSup_apply] #align measure_theory.supr₂_lintegral_le MeasureTheory.iSup₂_lintegral_le theorem le_iInf_lintegral {ι : Sort} (f : ι → α → ℝ≥0∞) : ∫⁻ a, ⨅ i, f i a ∂μ ≤ ⨅ i, ∫⁻ a, f i a ∂μ := by simp only [← iInf_apply] exact (monotone_lintegral μ).map_iInf_le #align measure_theory.le_infi_lintegral MeasureTheory.le_iInf_lintegral theorem le_iInf₂_lintegral {ι : Sort} {ι' : ι → Sort} (f : ∀ i, ι' i → α → ℝ≥0∞) : ∫⁻ a, ⨅ (i) (h : ι' i), f i h a ∂μ ≤ ⨅ (i) (h : ι' i), ∫⁻ a, f i h a ∂μ := by convert (monotone_lintegral μ).map_iInf₂_le f with a simp only [iInf_apply] #align measure_theory.le_infi₂_lintegral MeasureTheory.le_iInf₂_lintegral theorem lintegral_mono_ae {f g : α → ℝ≥0∞} (h : ∀ᵐ a ∂μ, f a ≤ g a) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂μ := by rcases exists_measurable_superset_of_null h with ⟨t, hts, ht, ht0⟩ have : ∀ᵐ x ∂μ, x ∉ t := measure_zero_iff_ae_nmem.1 ht0 rw [lintegral, lintegral] refine iSup_le fun s => iSup_le fun hfs => le_iSup_of_le (s.restrict tᶜ) <\| le_iSup_of_le ?_ ?_ · intro a by_cases h : a ∈ t <;> simp only [restrict_apply s ht.compl, mem_compl_iff, h, not_true, not_false_eq_true, indicator_of_not_mem, zero_le, not_false_eq_true, indicator_of_mem] exact le_trans (hfs a) (_root_.by_contradiction fun hnfg => h (hts hnfg)) · refine le_of_eq (SimpleFunc.lintegral_congr <\| this.mono fun a hnt => ?_) by_cases hat : a ∈ t <;> simp only [restrict_apply s ht.compl, mem_compl_iff, hat, not_true, not_false_eq_true, indicator_of_not_mem, not_false_eq_true, indicator_of_mem] exact (hnt hat).elim #align measure_theory.lintegral_mono_ae MeasureTheory.lintegral_mono_ae theorem set_lintegral_mono_ae {s : Set α} {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) (hfg : ∀ᵐ x ∂μ, x ∈ s → f x ≤ g x) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in s, g x ∂μ := lintegral_mono_ae <\| (ae_restrict_iff <\| measurableSet_le hf hg).2 hfg #align measure_theory.set_lintegral_mono_ae MeasureTheory.set_lintegral_mono_ae theorem set_lintegral_mono {s : Set α} {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) (hfg : ∀ x ∈ s, f x ≤ g x) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in s, g x ∂μ := set_lintegral_mono_ae hf hg (ae_of_all _ hfg) #align measure_theory.set_lintegral_mono MeasureTheory.set_lintegral_mono theorem set_lintegral_mono_ae' {s : Set α} {f g : α → ℝ≥0∞} (hs : MeasurableSet s) (hfg : ∀ᵐ x ∂μ, x ∈ s → f x ≤ g x) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in s, g x ∂μ := lintegral_mono_ae <\| (ae_restrict_iff' hs).2 hfg theorem set_lintegral_mono' {s : Set α} {f g : α → ℝ≥0∞} (hs : MeasurableSet s) (hfg : ∀ x ∈ s, f x ≤ g x) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in s, g x ∂μ := set_lintegral_mono_ae' hs (ae_of_all _ hfg) theorem set_lintegral_le_lintegral (s : Set α) (f : α → ℝ≥0∞) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x, f x ∂μ := lintegral_mono' Measure.restrict_le_self le_rfl theorem lintegral_congr_ae {f g : α → ℝ≥0∞} (h : f =ᵐ[μ] g) : ∫⁻ a, f a ∂μ = ∫⁻ a, g a ∂μ := le_antisymm (lintegral_mono_ae <\| h.le) (lintegral_mono_ae <\| h.symm.le) #align measure_theory.lintegral_congr_ae MeasureTheory.lintegral_congr_ae theorem lintegral_congr {f g : α → ℝ≥0∞} (h : ∀ a, f a = g a) : ∫⁻ a, f a ∂μ = ∫⁻ a, g a ∂μ := by simp only [h] #align measure_theory.lintegral_congr MeasureTheory.lintegral_congr theorem set_lintegral_congr {f : α → ℝ≥0∞} {s t : Set α} (h : s =ᵐ[μ] t) : ∫⁻ x in s, f x ∂μ = ∫⁻ x in t, f x ∂μ := by rw [Measure.restrict_congr_set h] #align measure_theory.set_lintegral_congr MeasureTheory.set_lintegral_congr theorem set_lintegral_congr_fun {f g : α → ℝ≥0∞} {s : Set α} (hs : MeasurableSet s) (hfg : ∀ᵐ x ∂μ, x ∈ s → f x = g x) : ∫⁻ x in s, f x ∂μ = ∫⁻ x in s, g x ∂μ := by rw [lintegral_congr_ae] rw [EventuallyEq] rwa [ae_restrict_iff' hs] #align measure_theory.set_lintegral_congr_fun MeasureTheory.set_lintegral_congr_fun theorem lintegral_ofReal_le_lintegral_nnnorm (f : α → ℝ) : ∫⁻ x, ENNReal.ofReal (f x) ∂μ ≤ ∫⁻ x, ‖f x‖₊ ∂μ := by simp_rw [← ofReal_norm_eq_coe_nnnorm] refine lintegral_mono fun x => ENNReal.ofReal_le_ofReal ?_ rw [Real.norm_eq_abs] exact le_abs_self (f x) #align measure_theory.lintegral_of_real_le_lintegral_nnnorm MeasureTheory.lintegral_ofReal_le_lintegral_nnnorm theorem lintegral_nnnorm_eq_of_ae_nonneg {f : α → ℝ} (h_nonneg : 0 ≤ᵐ[μ] f) : ∫⁻ x, ‖f x‖₊ ∂μ = ∫⁻ x, ENNReal.ofReal (f x) ∂μ := by apply lintegral_congr_ae filter_upwards [h_nonneg] with x hx rw [Real.nnnorm_of_nonneg hx, ENNReal.ofReal_eq_coe_nnreal hx] #align measure_theory.lintegral_nnnorm_eq_of_ae_nonneg MeasureTheory.lintegral_nnnorm_eq_of_ae_nonneg theorem lintegral_nnnorm_eq_of_nonneg {f : α → ℝ} (h_nonneg : 0 ≤ f) : ∫⁻ x, ‖f x‖₊ ∂μ = ∫⁻ x, ENNReal.ofReal (f x) ∂μ := lintegral_nnnorm_eq_of_ae_nonneg (Filter.eventually_of_forall h_nonneg) #align measure_theory.lintegral_nnnorm_eq_of_nonneg MeasureTheory.lintegral_nnnorm_eq_of_nonneg theorem lintegral_iSup {f : ℕ → α → ℝ≥0∞} (hf : ∀ n, Measurable (f n)) (h_mono : Monotone f) : ∫⁻ a, ⨆ n, f n a ∂μ = ⨆ n, ∫⁻ a, f n a ∂μ := by set c : ℝ≥0 → ℝ≥0∞ := (↑) set F := fun a : α => ⨆ n, f n a refine le_antisymm ?_ (iSup_lintegral_le _) rw [lintegral_eq_nnreal] refine iSup_le fun s => iSup_le fun hsf => ?_ refine ENNReal.le_of_forall_lt_one_mul_le fun a ha => ?_ rcases ENNReal.lt_iff_exists_coe.1 ha with ⟨r, rfl, _⟩ have ha : r < 1 := ENNReal.coe_lt_coe.1 ha let rs := s.map fun a => r * a have eq_rs : rs.map c = (const α r : α →ₛ ℝ≥0∞) * map c s := rfl have eq : ∀ p, rs.map c ⁻¹' {p} = ⋃ n, rs.map c ⁻¹' {p} ∩ { a \| p ≤ f n a } := by intro p rw [← inter_iUnion]; nth_rw 1 [← inter_univ (map c rs ⁻¹' {p})] refine Set.ext fun x => and_congr_right fun hx => true_iff_iff.2 ?_ by_cases p_eq : p = 0 · simp [p_eq] simp only [coe_map, mem_preimage, Function.comp_apply, mem_singleton_iff] at hx subst hx have : r * s x ≠ 0 := by rwa [Ne, ← ENNReal.coe_eq_zero] have : s x ≠ 0 := right_ne_zero_of_mul this have : (rs.map c) x < ⨆ n : ℕ, f n x := by refine lt_of_lt_of_le (ENNReal.coe_lt_coe.2 ?_) (hsf x) suffices r * s x < 1 * s x by simpa exact mul_lt_mul_of_pos_right ha (pos_iff_ne_zero.2 this) rcases lt_iSup_iff.1 this with ⟨i, hi⟩ exact mem_iUnion.2 ⟨i, le_of_lt hi⟩ have mono : ∀ r : ℝ≥0∞, Monotone fun n => rs.map c ⁻¹' {r} ∩ { a \| r ≤ f n a } := by intro r i j h refine inter_subset_inter_right _ ?_ simp_rw [subset_def, mem_setOf] intro x hx exact le_trans hx (h_mono h x) have h_meas : ∀ n, MeasurableSet {a : α \| map c rs a ≤ f n a} := fun n => measurableSet_le (SimpleFunc.measurable _) (hf n) calc (r : ℝ≥0∞) * (s.map c).lintegral μ = ∑ r ∈ (rs.map c).range, r * μ (rs.map c ⁻¹' {r}) := by rw [← const_mul_lintegral, eq_rs, SimpleFunc.lintegral] _ = ∑ r ∈ (rs.map c).range, r * μ (⋃ n, rs.map c ⁻¹' {r} ∩ { a \| r ≤ f n a }) := by simp only [(eq _).symm] _ = ∑ r ∈ (rs.map c).range, ⨆ n, r * μ (rs.map c ⁻¹' {r} ∩ { a \| r ≤ f n a }) := (Finset.sum_congr rfl fun x _ => by rw [measure_iUnion_eq_iSup (mono x).directed_le, ENNReal.mul_iSup]) _ = ⨆ n, ∑ r ∈ (rs.map c).range, r * μ (rs.map c ⁻¹' {r} ∩ { a \| r ≤ f n a }) := by refine ENNReal.finset_sum_iSup_nat fun p i j h ↦ ?_ gcongr _ * μ ?_ exact mono p h _ ≤ ⨆ n : ℕ, ((rs.map c).restrict { a \| (rs.map c) a ≤ f n a }).lintegral μ := by gcongr with n rw [restrict_lintegral _ (h_meas n)] refine le_of_eq (Finset.sum_congr rfl fun r _ => ?_) congr 2 with a refine and_congr_right ?_ simp (config := { contextual := true }) _ ≤ ⨆ n, ∫⁻ a, f n a ∂μ := by simp only [← SimpleFunc.lintegral_eq_lintegral] gcongr with n a simp only [map_apply] at h_meas simp only [coe_map, restrict_apply _ (h_meas _), (· ∘ ·)] exact indicator_apply_le id #align measure_theory.lintegral_supr MeasureTheory.lintegral_iSup theorem lintegral_iSup' {f : ℕ → α → ℝ≥0∞} (hf : ∀ n, AEMeasurable (f n) μ) (h_mono : ∀ᵐ x ∂μ, Monotone fun n => f n x) : ∫⁻ a, ⨆ n, f n a ∂μ = ⨆ n, ∫⁻ a, f n a ∂μ := by simp_rw [← iSup_apply] let p : α → (ℕ → ℝ≥0∞) → Prop := fun _ f' => Monotone f' have hp : ∀ᵐ x ∂μ, p x fun i => f i x := h_mono have h_ae_seq_mono : Monotone (aeSeq hf p) := by intro n m hnm x by_cases hx : x ∈ aeSeqSet hf p · exact aeSeq.prop_of_mem_aeSeqSet hf hx hnm · simp only [aeSeq, hx, if_false, le_rfl] rw [lintegral_congr_ae (aeSeq.iSup hf hp).symm] simp_rw [iSup_apply] rw [lintegral_iSup (aeSeq.measurable hf p) h_ae_seq_mono] congr with n exact lintegral_congr_ae (aeSeq.aeSeq_n_eq_fun_n_ae hf hp n) #align measure_theory.lintegral_supr' MeasureTheory.lintegral_iSup' theorem lintegral_tendsto_of_tendsto_of_monotone {f : ℕ → α → ℝ≥0∞} {F : α → ℝ≥0∞} (hf : ∀ n, AEMeasurable (f n) μ) (h_mono : ∀ᵐ x ∂μ, Monotone fun n => f n x) (h_tendsto : ∀ᵐ x ∂μ, Tendsto (fun n => f n x) atTop (𝓝 <\| F x)) : Tendsto (fun n => ∫⁻ x, f n x ∂μ) atTop (𝓝 <\| ∫⁻ x, F x ∂μ) := by have : Monotone fun n => ∫⁻ x, f n x ∂μ := fun i j hij => lintegral_mono_ae (h_mono.mono fun x hx => hx hij) suffices key : ∫⁻ x, F x ∂μ = ⨆ n, ∫⁻ x, f n x ∂μ by rw [key] exact tendsto_atTop_iSup this rw [← lintegral_iSup' hf h_mono] refine lintegral_congr_ae ?_ filter_upwards [h_mono, h_tendsto] with _ hx_mono hx_tendsto using tendsto_nhds_unique hx_tendsto (tendsto_atTop_iSup hx_mono) #align measure_theory.lintegral_tendsto_of_tendsto_of_monotone MeasureTheory.lintegral_tendsto_of_tendsto_of_monotone theorem lintegral_eq_iSup_eapprox_lintegral {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, f a ∂μ = ⨆ n, (eapprox f n).lintegral μ := calc ∫⁻ a, f a ∂μ = ∫⁻ a, ⨆ n, (eapprox f n : α → ℝ≥0∞) a ∂μ := by congr; ext a; rw [iSup_eapprox_apply f hf] _ = ⨆ n, ∫⁻ a, (eapprox f n : α → ℝ≥0∞) a ∂μ := by apply lintegral_iSup · measurability · intro i j h exact monotone_eapprox f h _ = ⨆ n, (eapprox f n).lintegral μ := by congr; ext n; rw [(eapprox f n).lintegral_eq_lintegral] #align measure_theory.lintegral_eq_supr_eapprox_lintegral MeasureTheory.lintegral_eq_iSup_eapprox_lintegral theorem exists_pos_set_lintegral_lt_of_measure_lt {f : α → ℝ≥0∞} (h : ∫⁻ x, f x ∂μ ≠ ∞) {ε : ℝ≥0∞} (hε : ε ≠ 0) : ∃ δ > 0, ∀ s, μ s < δ → ∫⁻ x in s, f x ∂μ < ε := by rcases exists_between (pos_iff_ne_zero.mpr hε) with ⟨ε₂, hε₂0, hε₂ε⟩ rcases exists_between hε₂0 with ⟨ε₁, hε₁0, hε₁₂⟩ rcases exists_simpleFunc_forall_lintegral_sub_lt_of_pos h hε₁0.ne' with ⟨φ, _, hφ⟩ rcases φ.exists_forall_le with ⟨C, hC⟩ use (ε₂ - ε₁) / C, ENNReal.div_pos_iff.2 ⟨(tsub_pos_iff_lt.2 hε₁₂).ne', ENNReal.coe_ne_top⟩ refine fun s hs => lt_of_le_of_lt ?_ hε₂ε simp only [lintegral_eq_nnreal, iSup_le_iff] intro ψ hψ calc (map (↑) ψ).lintegral (μ.restrict s) ≤ (map (↑) φ).lintegral (μ.restrict s) + (map (↑) (ψ - φ)).lintegral (μ.restrict s) := by rw [← SimpleFunc.add_lintegral, ← SimpleFunc.map_add @ENNReal.coe_add] refine SimpleFunc.lintegral_mono (fun x => ?_) le_rfl simp only [add_tsub_eq_max, le_max_right, coe_map, Function.comp_apply, SimpleFunc.coe_add, SimpleFunc.coe_sub, Pi.add_apply, Pi.sub_apply, ENNReal.coe_max (φ x) (ψ x)] _ ≤ (map (↑) φ).lintegral (μ.restrict s) + ε₁ := by gcongr refine le_trans ?_ (hφ _ hψ).le exact SimpleFunc.lintegral_mono le_rfl Measure.restrict_le_self _ ≤ (SimpleFunc.const α (C : ℝ≥0∞)).lintegral (μ.restrict s) + ε₁ := by gcongr exact SimpleFunc.lintegral_mono (fun x ↦ ENNReal.coe_le_coe.2 (hC x)) le_rfl _ = C * μ s + ε₁ := by simp only [← SimpleFunc.lintegral_eq_lintegral, coe_const, lintegral_const, Measure.restrict_apply, MeasurableSet.univ, univ_inter, Function.const] _ ≤ C * ((ε₂ - ε₁) / C) + ε₁ := by gcongr _ ≤ ε₂ - ε₁ + ε₁ := by gcongr; apply mul_div_le _ = ε₂ := tsub_add_cancel_of_le hε₁₂.le #align measure_theory.exists_pos_set_lintegral_lt_of_measure_lt MeasureTheory.exists_pos_set_lintegral_lt_of_measure_lt theorem tendsto_set_lintegral_zero {ι} {f : α → ℝ≥0∞} (h : ∫⁻ x, f x ∂μ ≠ ∞) {l : Filter ι} {s : ι → Set α} (hl : Tendsto (μ ∘ s) l (𝓝 0)) : Tendsto (fun i => ∫⁻ x in s i, f x ∂μ) l (𝓝 0) := by simp only [ENNReal.nhds_zero, tendsto_iInf, tendsto_principal, mem_Iio, ← pos_iff_ne_zero] at hl ⊢ intro ε ε0 rcases exists_pos_set_lintegral_lt_of_measure_lt h ε0.ne' with ⟨δ, δ0, hδ⟩ exact (hl δ δ0).mono fun i => hδ _ #align measure_theory.tendsto_set_lintegral_zero MeasureTheory.tendsto_set_lintegral_zero theorem le_lintegral_add (f g : α → ℝ≥0∞) : ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ ≤ ∫⁻ a, f a + g a ∂μ := by simp only [lintegral] refine ENNReal.biSup_add_biSup_le' (p := fun h : α →ₛ ℝ≥0∞ => h ≤ f) (q := fun h : α →ₛ ℝ≥0∞ => h ≤ g) ⟨0, zero_le f⟩ ⟨0, zero_le g⟩ fun f' hf' g' hg' => ?_ exact le_iSup₂_of_le (f' + g') (add_le_add hf' hg') (add_lintegral _ _).ge #align measure_theory.le_lintegral_add MeasureTheory.le_lintegral_add -- Use stronger lemmas `lintegral_add_left`/`lintegral_add_right` instead theorem lintegral_add_aux {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := calc ∫⁻ a, f a + g a ∂μ = ∫⁻ a, (⨆ n, (eapprox f n : α → ℝ≥0∞) a) + ⨆ n, (eapprox g n : α → ℝ≥0∞) a ∂μ := by simp only [iSup_eapprox_apply, hf, hg] _ = ∫⁻ a, ⨆ n, (eapprox f n + eapprox g n : α → ℝ≥0∞) a ∂μ := by congr; funext a rw [ENNReal.iSup_add_iSup_of_monotone] · simp only [Pi.add_apply] · intro i j h exact monotone_eapprox _ h a · intro i j h exact monotone_eapprox _ h a _ = ⨆ n, (eapprox f n).lintegral μ + (eapprox g n).lintegral μ := by rw [lintegral_iSup] · congr funext n rw [← SimpleFunc.add_lintegral, ← SimpleFunc.lintegral_eq_lintegral] simp only [Pi.add_apply, SimpleFunc.coe_add] · measurability · intro i j h a dsimp gcongr <;> exact monotone_eapprox _ h _ _ = (⨆ n, (eapprox f n).lintegral μ) + ⨆ n, (eapprox g n).lintegral μ := by refine (ENNReal.iSup_add_iSup_of_monotone ?_ ?_).symm <;> · intro i j h exact SimpleFunc.lintegral_mono (monotone_eapprox _ h) le_rfl _ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := by rw [lintegral_eq_iSup_eapprox_lintegral hf, lintegral_eq_iSup_eapprox_lintegral hg] #align measure_theory.lintegral_add_aux MeasureTheory.lintegral_add_aux @[simp] theorem lintegral_add_left {f : α → ℝ≥0∞} (hf : Measurable f) (g : α → ℝ≥0∞) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := by refine le_antisymm ?_ (le_lintegral_add _ _) rcases exists_measurable_le_lintegral_eq μ fun a => f a + g a with ⟨φ, hφm, hφ_le, hφ_eq⟩ calc ∫⁻ a, f a + g a ∂μ = ∫⁻ a, φ a ∂μ := hφ_eq _ ≤ ∫⁻ a, f a + (φ a - f a) ∂μ := lintegral_mono fun a => le_add_tsub _ = ∫⁻ a, f a ∂μ + ∫⁻ a, φ a - f a ∂μ := lintegral_add_aux hf (hφm.sub hf) _ ≤ ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := add_le_add_left (lintegral_mono fun a => tsub_le_iff_left.2 <\| hφ_le a) _ #align measure_theory.lintegral_add_left MeasureTheory.lintegral_add_left theorem lintegral_add_left' {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) (g : α → ℝ≥0∞) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := by rw [lintegral_congr_ae hf.ae_eq_mk, ← lintegral_add_left hf.measurable_mk, lintegral_congr_ae (hf.ae_eq_mk.add (ae_eq_refl g))] #align measure_theory.lintegral_add_left' MeasureTheory.lintegral_add_left' theorem lintegral_add_right' (f : α → ℝ≥0∞) {g : α → ℝ≥0∞} (hg : AEMeasurable g μ) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := by simpa only [add_comm] using lintegral_add_left' hg f #align measure_theory.lintegral_add_right' MeasureTheory.lintegral_add_right' @[simp] theorem lintegral_add_right (f : α → ℝ≥0∞) {g : α → ℝ≥0∞} (hg : Measurable g) : ∫⁻ a, f a + g a ∂μ = ∫⁻ a, f a ∂μ + ∫⁻ a, g a ∂μ := lintegral_add_right' f hg.aemeasurable #align measure_theory.lintegral_add_right MeasureTheory.lintegral_add_right @[simp] theorem lintegral_smul_measure (c : ℝ≥0∞) (f : α → ℝ≥0∞) : ∫⁻ a, f a ∂c • μ = c * ∫⁻ a, f a ∂μ := by simp only [lintegral, iSup_subtype', SimpleFunc.lintegral_smul, ENNReal.mul_iSup, smul_eq_mul] #align measure_theory.lintegral_smul_measure MeasureTheory.lintegral_smul_measure lemma set_lintegral_smul_measure (c : ℝ≥0∞) (f : α → ℝ≥0∞) (s : Set α) : ∫⁻ a in s, f a ∂(c • μ) = c * ∫⁻ a in s, f a ∂μ := by rw [Measure.restrict_smul, lintegral_smul_measure] @[simp] theorem lintegral_sum_measure {m : MeasurableSpace α} {ι} (f : α → ℝ≥0∞) (μ : ι → Measure α) : ∫⁻ a, f a ∂Measure.sum μ = ∑' i, ∫⁻ a, f a ∂μ i := by simp only [lintegral, iSup_subtype', SimpleFunc.lintegral_sum, ENNReal.tsum_eq_iSup_sum] rw [iSup_comm] congr; funext s induction' s using Finset.induction_on with i s hi hs · simp simp only [Finset.sum_insert hi, ← hs] refine (ENNReal.iSup_add_iSup ?_).symm intro φ ψ exact ⟨⟨φ ⊔ ψ, fun x => sup_le (φ.2 x) (ψ.2 x)⟩, add_le_add (SimpleFunc.lintegral_mono le_sup_left le_rfl) (Finset.sum_le_sum fun j _ => SimpleFunc.lintegral_mono le_sup_right le_rfl)⟩ #align measure_theory.lintegral_sum_measure MeasureTheory.lintegral_sum_measure theorem hasSum_lintegral_measure {ι} {_ : MeasurableSpace α} (f : α → ℝ≥0∞) (μ : ι → Measure α) : HasSum (fun i => ∫⁻ a, f a ∂μ i) (∫⁻ a, f a ∂Measure.sum μ) := (lintegral_sum_measure f μ).symm ▸ ENNReal.summable.hasSum #align measure_theory.has_sum_lintegral_measure MeasureTheory.hasSum_lintegral_measure @[simp] theorem lintegral_add_measure {m : MeasurableSpace α} (f : α → ℝ≥0∞) (μ ν : Measure α) : ∫⁻ a, f a ∂(μ + ν) = ∫⁻ a, f a ∂μ + ∫⁻ a, f a ∂ν := by simpa [tsum_fintype] using lintegral_sum_measure f fun b => cond b μ ν #align measure_theory.lintegral_add_measure MeasureTheory.lintegral_add_measure @[simp] theorem lintegral_finset_sum_measure {ι} {m : MeasurableSpace α} (s : Finset ι) (f : α → ℝ≥0∞) (μ : ι → Measure α) : ∫⁻ a, f a ∂(∑ i ∈ s, μ i) = ∑ i ∈ s, ∫⁻ a, f a ∂μ i := by rw [← Measure.sum_coe_finset, lintegral_sum_measure, ← Finset.tsum_subtype'] simp only [Finset.coe_sort_coe] #align measure_theory.lintegral_finset_sum_measure MeasureTheory.lintegral_finset_sum_measure @[simp] theorem lintegral_zero_measure {m : MeasurableSpace α} (f : α → ℝ≥0∞) : ∫⁻ a, f a ∂(0 : Measure α) = 0 := by simp [lintegral] #align measure_theory.lintegral_zero_measure MeasureTheory.lintegral_zero_measure @[simp] theorem lintegral_of_isEmpty {α} [MeasurableSpace α] [IsEmpty α] (μ : Measure α) (f : α → ℝ≥0∞) : ∫⁻ x, f x ∂μ = 0 := by have : Subsingleton (Measure α) := inferInstance convert lintegral_zero_measure f theorem set_lintegral_empty (f : α → ℝ≥0∞) : ∫⁻ x in ∅, f x ∂μ = 0 := by rw [Measure.restrict_empty, lintegral_zero_measure] #align measure_theory.set_lintegral_empty MeasureTheory.set_lintegral_empty theorem set_lintegral_univ (f : α → ℝ≥0∞) : ∫⁻ x in univ, f x ∂μ = ∫⁻ x, f x ∂μ := by rw [Measure.restrict_univ] #align measure_theory.set_lintegral_univ MeasureTheory.set_lintegral_univ theorem set_lintegral_measure_zero (s : Set α) (f : α → ℝ≥0∞) (hs' : μ s = 0) : ∫⁻ x in s, f x ∂μ = 0 := by convert lintegral_zero_measure _ exact Measure.restrict_eq_zero.2 hs' #align measure_theory.set_lintegral_measure_zero MeasureTheory.set_lintegral_measure_zero theorem lintegral_finset_sum' (s : Finset β) {f : β → α → ℝ≥0∞} (hf : ∀ b ∈ s, AEMeasurable (f b) μ) : ∫⁻ a, ∑ b ∈ s, f b a ∂μ = ∑ b ∈ s, ∫⁻ a, f b a ∂μ := by induction' s using Finset.induction_on with a s has ih · simp · simp only [Finset.sum_insert has] rw [Finset.forall_mem_insert] at hf rw [lintegral_add_left' hf.1, ih hf.2] #align measure_theory.lintegral_finset_sum' MeasureTheory.lintegral_finset_sum' theorem lintegral_finset_sum (s : Finset β) {f : β → α → ℝ≥0∞} (hf : ∀ b ∈ s, Measurable (f b)) : ∫⁻ a, ∑ b ∈ s, f b a ∂μ = ∑ b ∈ s, ∫⁻ a, f b a ∂μ := lintegral_finset_sum' s fun b hb => (hf b hb).aemeasurable #align measure_theory.lintegral_finset_sum MeasureTheory.lintegral_finset_sum @[simp] theorem lintegral_const_mul (r : ℝ≥0∞) {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, r * f a ∂μ = r * ∫⁻ a, f a ∂μ := calc ∫⁻ a, r * f a ∂μ = ∫⁻ a, ⨆ n, (const α r * eapprox f n) a ∂μ := by congr funext a rw [← iSup_eapprox_apply f hf, ENNReal.mul_iSup] simp _ = ⨆ n, r * (eapprox f n).lintegral μ := by rw [lintegral_iSup] · congr funext n rw [← SimpleFunc.const_mul_lintegral, ← SimpleFunc.lintegral_eq_lintegral] · intro n exact SimpleFunc.measurable _ · intro i j h a exact mul_le_mul_left' (monotone_eapprox _ h _) _ _ = r * ∫⁻ a, f a ∂μ := by rw [← ENNReal.mul_iSup, lintegral_eq_iSup_eapprox_lintegral hf] #align measure_theory.lintegral_const_mul MeasureTheory.lintegral_const_mul theorem lintegral_const_mul'' (r : ℝ≥0∞) {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) : ∫⁻ a, r * f a ∂μ = r * ∫⁻ a, f a ∂μ := by have A : ∫⁻ a, f a ∂μ = ∫⁻ a, hf.mk f a ∂μ := lintegral_congr_ae hf.ae_eq_mk have B : ∫⁻ a, r * f a ∂μ = ∫⁻ a, r * hf.mk f a ∂μ := lintegral_congr_ae (EventuallyEq.fun_comp hf.ae_eq_mk _) rw [A, B, lintegral_const_mul _ hf.measurable_mk] #align measure_theory.lintegral_const_mul'' MeasureTheory.lintegral_const_mul'' theorem lintegral_const_mul_le (r : ℝ≥0∞) (f : α → ℝ≥0∞) : r * ∫⁻ a, f a ∂μ ≤ ∫⁻ a, r * f a ∂μ := by rw [lintegral, ENNReal.mul_iSup] refine iSup_le fun s => ?_ rw [ENNReal.mul_iSup, iSup_le_iff] intro hs rw [← SimpleFunc.const_mul_lintegral, lintegral] refine le_iSup_of_le (const α r * s) (le_iSup_of_le (fun x => ?_) le_rfl) exact mul_le_mul_left' (hs x) _ #align measure_theory.lintegral_const_mul_le MeasureTheory.lintegral_const_mul_le theorem lintegral_const_mul' (r : ℝ≥0∞) (f : α → ℝ≥0∞) (hr : r ≠ ∞) : ∫⁻ a, r * f a ∂μ = r * ∫⁻ a, f a ∂μ := by by_cases h : r = 0 · simp [h] apply le_antisymm _ (lintegral_const_mul_le r f) have rinv : r * r⁻¹ = 1 := ENNReal.mul_inv_cancel h hr have rinv' : r⁻¹ * r = 1 := by rw [mul_comm] exact rinv have := lintegral_const_mul_le (μ := μ) r⁻¹ fun x => r * f x simp? [(mul_assoc _ _ _).symm, rinv'] at this says simp only [(mul_assoc _ _ _).symm, rinv', one_mul] at this simpa [(mul_assoc _ _ _).symm, rinv] using mul_le_mul_left' this r #align measure_theory.lintegral_const_mul' MeasureTheory.lintegral_const_mul' theorem lintegral_mul_const (r : ℝ≥0∞) {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, f a * r ∂μ = (∫⁻ a, f a ∂μ) * r := by simp_rw [mul_comm, lintegral_const_mul r hf] #align measure_theory.lintegral_mul_const MeasureTheory.lintegral_mul_const theorem lintegral_mul_const'' (r : ℝ≥0∞) {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) : ∫⁻ a, f a * r ∂μ = (∫⁻ a, f a ∂μ) * r := by simp_rw [mul_comm, lintegral_const_mul'' r hf] #align measure_theory.lintegral_mul_const'' MeasureTheory.lintegral_mul_const'' theorem lintegral_mul_const_le (r : ℝ≥0∞) (f : α → ℝ≥0∞) : (∫⁻ a, f a ∂μ) * r ≤ ∫⁻ a, f a * r ∂μ := by simp_rw [mul_comm, lintegral_const_mul_le r f] #align measure_theory.lintegral_mul_const_le MeasureTheory.lintegral_mul_const_le theorem lintegral_mul_const' (r : ℝ≥0∞) (f : α → ℝ≥0∞) (hr : r ≠ ∞) : ∫⁻ a, f a * r ∂μ = (∫⁻ a, f a ∂μ) * r := by simp_rw [mul_comm, lintegral_const_mul' r f hr] #align measure_theory.lintegral_mul_const' MeasureTheory.lintegral_mul_const' theorem lintegral_lintegral_mul {β} [MeasurableSpace β] {ν : Measure β} {f : α → ℝ≥0∞} {g : β → ℝ≥0∞} (hf : AEMeasurable f μ) (hg : AEMeasurable g ν) : ∫⁻ x, ∫⁻ y, f x * g y ∂ν ∂μ = (∫⁻ x, f x ∂μ) * ∫⁻ y, g y ∂ν := by simp [lintegral_const_mul'' _ hg, lintegral_mul_const'' _ hf] #align measure_theory.lintegral_lintegral_mul MeasureTheory.lintegral_lintegral_mul -- TODO: Need a better way of rewriting inside of an integral theorem lintegral_rw₁ {f f' : α → β} (h : f =ᵐ[μ] f') (g : β → ℝ≥0∞) : ∫⁻ a, g (f a) ∂μ = ∫⁻ a, g (f' a) ∂μ := lintegral_congr_ae <\| h.mono fun a h => by dsimp only; rw [h] #align measure_theory.lintegral_rw₁ MeasureTheory.lintegral_rw₁ -- TODO: Need a better way of rewriting inside of an integral theorem lintegral_rw₂ {f₁ f₁' : α → β} {f₂ f₂' : α → γ} (h₁ : f₁ =ᵐ[μ] f₁') (h₂ : f₂ =ᵐ[μ] f₂') (g : β → γ → ℝ≥0∞) : ∫⁻ a, g (f₁ a) (f₂ a) ∂μ = ∫⁻ a, g (f₁' a) (f₂' a) ∂μ := lintegral_congr_ae <\| h₁.mp <\| h₂.mono fun _ h₂ h₁ => by dsimp only; rw [h₁, h₂] #align measure_theory.lintegral_rw₂ MeasureTheory.lintegral_rw₂ theorem lintegral_indicator_le (f : α → ℝ≥0∞) (s : Set α) : ∫⁻ a, s.indicator f a ∂μ ≤ ∫⁻ a in s, f a ∂μ := by simp only [lintegral] apply iSup_le (fun g ↦ (iSup_le (fun hg ↦ ?_))) have : g ≤ f := hg.trans (indicator_le_self s f) refine le_iSup_of_le g (le_iSup_of_le this (le_of_eq ?_)) rw [lintegral_restrict, SimpleFunc.lintegral] congr with t by_cases H : t = 0 · simp [H] congr with x simp only [mem_preimage, mem_singleton_iff, mem_inter_iff, iff_self_and] rintro rfl contrapose! H simpa [H] using hg x @[simp] theorem lintegral_indicator (f : α → ℝ≥0∞) {s : Set α} (hs : MeasurableSet s) : ∫⁻ a, s.indicator f a ∂μ = ∫⁻ a in s, f a ∂μ := by apply le_antisymm (lintegral_indicator_le f s) simp only [lintegral, ← restrict_lintegral_eq_lintegral_restrict _ hs, iSup_subtype'] refine iSup_mono' (Subtype.forall.2 fun φ hφ => ?_) refine ⟨⟨φ.restrict s, fun x => ?_⟩, le_rfl⟩ simp [hφ x, hs, indicator_le_indicator] #align measure_theory.lintegral_indicator MeasureTheory.lintegral_indicator theorem lintegral_indicator₀ (f : α → ℝ≥0∞) {s : Set α} (hs : NullMeasurableSet s μ) : ∫⁻ a, s.indicator f a ∂μ = ∫⁻ a in s, f a ∂μ := by rw [← lintegral_congr_ae (indicator_ae_eq_of_ae_eq_set hs.toMeasurable_ae_eq), lintegral_indicator _ (measurableSet_toMeasurable _ _), Measure.restrict_congr_set hs.toMeasurable_ae_eq] #align measure_theory.lintegral_indicator₀ MeasureTheory.lintegral_indicator₀ theorem lintegral_indicator_const_le (s : Set α) (c : ℝ≥0∞) : ∫⁻ a, s.indicator (fun _ => c) a ∂μ ≤ c * μ s := (lintegral_indicator_le _ _).trans (set_lintegral_const s c).le theorem lintegral_indicator_const₀ {s : Set α} (hs : NullMeasurableSet s μ) (c : ℝ≥0∞) : ∫⁻ a, s.indicator (fun _ => c) a ∂μ = c * μ s := by rw [lintegral_indicator₀ _ hs, set_lintegral_const] theorem lintegral_indicator_const {s : Set α} (hs : MeasurableSet s) (c : ℝ≥0∞) : ∫⁻ a, s.indicator (fun _ => c) a ∂μ = c * μ s := lintegral_indicator_const₀ hs.nullMeasurableSet c #align measure_theory.lintegral_indicator_const MeasureTheory.lintegral_indicator_const theorem set_lintegral_eq_const {f : α → ℝ≥0∞} (hf : Measurable f) (r : ℝ≥0∞) : ∫⁻ x in { x \| f x = r }, f x ∂μ = r * μ { x \| f x = r } := by have : ∀ᵐ x ∂μ, x ∈ { x \| f x = r } → f x = r := ae_of_all μ fun _ hx => hx rw [set_lintegral_congr_fun _ this] · rw [lintegral_const, Measure.restrict_apply MeasurableSet.univ, Set.univ_inter] · exact hf (measurableSet_singleton r) #align measure_theory.set_lintegral_eq_const MeasureTheory.set_lintegral_eq_const theorem lintegral_indicator_one_le (s : Set α) : ∫⁻ a, s.indicator 1 a ∂μ ≤ μ s := (lintegral_indicator_const_le _ _).trans <\| (one_mul _).le @[simp] theorem lintegral_indicator_one₀ (hs : NullMeasurableSet s μ) : ∫⁻ a, s.indicator 1 a ∂μ = μ s := (lintegral_indicator_const₀ hs _).trans <\| one_mul _ @[simp] theorem lintegral_indicator_one (hs : MeasurableSet s) : ∫⁻ a, s.indicator 1 a ∂μ = μ s := (lintegral_indicator_const hs _).trans <\| one_mul _ #align measure_theory.lintegral_indicator_one MeasureTheory.lintegral_indicator_one theorem lintegral_add_mul_meas_add_le_le_lintegral {f g : α → ℝ≥0∞} (hle : f ≤ᵐ[μ] g) (hg : AEMeasurable g μ) (ε : ℝ≥0∞) : ∫⁻ a, f a ∂μ + ε * μ { x \| f x + ε ≤ g x } ≤ ∫⁻ a, g a ∂μ := by rcases exists_measurable_le_lintegral_eq μ f with ⟨φ, hφm, hφ_le, hφ_eq⟩ calc ∫⁻ x, f x ∂μ + ε * μ { x \| f x + ε ≤ g x } = ∫⁻ x, φ x ∂μ + ε * μ { x \| f x + ε ≤ g x } := by rw [hφ_eq] _ ≤ ∫⁻ x, φ x ∂μ + ε * μ { x \| φ x + ε ≤ g x } := by gcongr exact fun x => (add_le_add_right (hφ_le _) _).trans _ = ∫⁻ x, φ x + indicator { x \| φ x + ε ≤ g x } (fun _ => ε) x ∂μ := by rw [lintegral_add_left hφm, lintegral_indicator₀, set_lintegral_const] exact measurableSet_le (hφm.nullMeasurable.measurable'.add_const _) hg.nullMeasurable _ ≤ ∫⁻ x, g x ∂μ := lintegral_mono_ae (hle.mono fun x hx₁ => ?_) simp only [indicator_apply]; split_ifs with hx₂ exacts [hx₂, (add_zero _).trans_le <\| (hφ_le x).trans hx₁] #align measure_theory.lintegral_add_mul_meas_add_le_le_lintegral MeasureTheory.lintegral_add_mul_meas_add_le_le_lintegral theorem mul_meas_ge_le_lintegral₀ {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) (ε : ℝ≥0∞) : ε * μ { x \| ε ≤ f x } ≤ ∫⁻ a, f a ∂μ := by simpa only [lintegral_zero, zero_add] using lintegral_add_mul_meas_add_le_le_lintegral (ae_of_all _ fun x => zero_le (f x)) hf ε #align measure_theory.mul_meas_ge_le_lintegral₀ MeasureTheory.mul_meas_ge_le_lintegral₀ theorem mul_meas_ge_le_lintegral {f : α → ℝ≥0∞} (hf : Measurable f) (ε : ℝ≥0∞) : ε * μ { x \| ε ≤ f x } ≤ ∫⁻ a, f a ∂μ := mul_meas_ge_le_lintegral₀ hf.aemeasurable ε #align measure_theory.mul_meas_ge_le_lintegral MeasureTheory.mul_meas_ge_le_lintegral lemma meas_le_lintegral₀ {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) {s : Set α} (hs : ∀ x ∈ s, 1 ≤ f x) : μ s ≤ ∫⁻ a, f a ∂μ := by apply le_trans _ (mul_meas_ge_le_lintegral₀ hf 1) rw [one_mul] exact measure_mono hs lemma lintegral_le_meas {s : Set α} {f : α → ℝ≥0∞} (hf : ∀ a, f a ≤ 1) (h'f : ∀ a ∈ sᶜ, f a = 0) : ∫⁻ a, f a ∂μ ≤ μ s := by apply (lintegral_mono (fun x ↦ ?_)).trans (lintegral_indicator_one_le s) by_cases hx : x ∈ s · simpa [hx] using hf x · simpa [hx] using h'f x hx theorem lintegral_eq_top_of_measure_eq_top_ne_zero {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) (hμf : μ {x \| f x = ∞} ≠ 0) : ∫⁻ x, f x ∂μ = ∞ := eq_top_iff.mpr <\| calc ∞ = ∞ * μ { x \| ∞ ≤ f x } := by simp [mul_eq_top, hμf] _ ≤ ∫⁻ x, f x ∂μ := mul_meas_ge_le_lintegral₀ hf ∞ #align measure_theory.lintegral_eq_top_of_measure_eq_top_ne_zero MeasureTheory.lintegral_eq_top_of_measure_eq_top_ne_zero theorem setLintegral_eq_top_of_measure_eq_top_ne_zero (hf : AEMeasurable f (μ.restrict s)) (hμf : μ ({x ∈ s \| f x = ∞}) ≠ 0) : ∫⁻ x in s, f x ∂μ = ∞ := lintegral_eq_top_of_measure_eq_top_ne_zero hf <\| mt (eq_bot_mono <\| by rw [← setOf_inter_eq_sep]; exact Measure.le_restrict_apply _ _) hμf #align measure_theory.set_lintegral_eq_top_of_measure_eq_top_ne_zero MeasureTheory.setLintegral_eq_top_of_measure_eq_top_ne_zero theorem measure_eq_top_of_lintegral_ne_top (hf : AEMeasurable f μ) (hμf : ∫⁻ x, f x ∂μ ≠ ∞) : μ {x \| f x = ∞} = 0 := of_not_not fun h => hμf <\| lintegral_eq_top_of_measure_eq_top_ne_zero hf h #align measure_theory.measure_eq_top_of_lintegral_ne_top MeasureTheory.measure_eq_top_of_lintegral_ne_top theorem measure_eq_top_of_setLintegral_ne_top (hf : AEMeasurable f (μ.restrict s)) (hμf : ∫⁻ x in s, f x ∂μ ≠ ∞) : μ ({x ∈ s \| f x = ∞}) = 0 := of_not_not fun h => hμf <\| setLintegral_eq_top_of_measure_eq_top_ne_zero hf h #align measure_theory.measure_eq_top_of_set_lintegral_ne_top MeasureTheory.measure_eq_top_of_setLintegral_ne_top theorem meas_ge_le_lintegral_div {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) {ε : ℝ≥0∞} (hε : ε ≠ 0) (hε' : ε ≠ ∞) : μ { x \| ε ≤ f x } ≤ (∫⁻ a, f a ∂μ) / ε := (ENNReal.le_div_iff_mul_le (Or.inl hε) (Or.inl hε')).2 <\| by rw [mul_comm] exact mul_meas_ge_le_lintegral₀ hf ε #align measure_theory.meas_ge_le_lintegral_div MeasureTheory.meas_ge_le_lintegral_div theorem ae_eq_of_ae_le_of_lintegral_le {f g : α → ℝ≥0∞} (hfg : f ≤ᵐ[μ] g) (hf : ∫⁻ x, f x ∂μ ≠ ∞) (hg : AEMeasurable g μ) (hgf : ∫⁻ x, g x ∂μ ≤ ∫⁻ x, f x ∂μ) : f =ᵐ[μ] g := by have : ∀ n : ℕ, ∀ᵐ x ∂μ, g x < f x + (n : ℝ≥0∞)⁻¹ := by intro n simp only [ae_iff, not_lt] have : ∫⁻ x, f x ∂μ + (↑n)⁻¹ * μ { x : α \| f x + (n : ℝ≥0∞)⁻¹ ≤ g x } ≤ ∫⁻ x, f x ∂μ := (lintegral_add_mul_meas_add_le_le_lintegral hfg hg n⁻¹).trans hgf rw [(ENNReal.cancel_of_ne hf).add_le_iff_nonpos_right, nonpos_iff_eq_zero, mul_eq_zero] at this exact this.resolve_left (ENNReal.inv_ne_zero.2 (ENNReal.natCast_ne_top _)) refine hfg.mp ((ae_all_iff.2 this).mono fun x hlt hle => hle.antisymm ?_) suffices Tendsto (fun n : ℕ => f x + (n : ℝ≥0∞)⁻¹) atTop (𝓝 (f x)) from ge_of_tendsto' this fun i => (hlt i).le simpa only [inv_top, add_zero] using tendsto_const_nhds.add (ENNReal.tendsto_inv_iff.2 ENNReal.tendsto_nat_nhds_top) #align measure_theory.ae_eq_of_ae_le_of_lintegral_le MeasureTheory.ae_eq_of_ae_le_of_lintegral_le @[simp] theorem lintegral_eq_zero_iff' {f : α → ℝ≥0∞} (hf : AEMeasurable f μ) : ∫⁻ a, f a ∂μ = 0 ↔ f =ᵐ[μ] 0 := have : ∫⁻ _ : α, 0 ∂μ ≠ ∞ := by simp [lintegral_zero, zero_ne_top] ⟨fun h => (ae_eq_of_ae_le_of_lintegral_le (ae_of_all _ <\| zero_le f) this hf (h.trans lintegral_zero.symm).le).symm, fun h => (lintegral_congr_ae h).trans lintegral_zero⟩ #align measure_theory.lintegral_eq_zero_iff' MeasureTheory.lintegral_eq_zero_iff' @[simp] theorem lintegral_eq_zero_iff {f : α → ℝ≥0∞} (hf : Measurable f) : ∫⁻ a, f a ∂μ = 0 ↔ f =ᵐ[μ] 0 := lintegral_eq_zero_iff' hf.aemeasurable #align measure_theory.lintegral_eq_zero_iff MeasureTheory.lintegral_eq_zero_iff theorem lintegral_pos_iff_support {f : α → ℝ≥0∞} (hf : Measurable f) : (0 < ∫⁻ a, f a ∂μ) ↔ 0 < μ (Function.support f) := by simp [pos_iff_ne_zero, hf, Filter.EventuallyEq, ae_iff, Function.support] #align measure_theory.lintegral_pos_iff_support MeasureTheory.lintegral_pos_iff_support theorem setLintegral_pos_iff {f : α → ℝ≥0∞} (hf : Measurable f) {s : Set α} : 0 < ∫⁻ a in s, f a ∂μ ↔ 0 < μ (Function.support f ∩ s) := by rw [lintegral_pos_iff_support hf, Measure.restrict_apply (measurableSet_support hf)] theorem lintegral_iSup_ae {f : ℕ → α → ℝ≥0∞} (hf : ∀ n, Measurable (f n)) (h_mono : ∀ n, ∀ᵐ a ∂μ, f n a ≤ f n.succ a) : ∫⁻ a, ⨆ n, f n a ∂μ = ⨆ n, ∫⁻ a, f n a ∂μ := by let ⟨s, hs⟩ := exists_measurable_superset_of_null (ae_iff.1 (ae_all_iff.2 h_mono)) let g n a := if a ∈ s then 0 else f n a have g_eq_f : ∀ᵐ a ∂μ, ∀ n, g n a = f n a := (measure_zero_iff_ae_nmem.1 hs.2.2).mono fun a ha n => if_neg ha calc ∫⁻ a, ⨆ n, f n a ∂μ = ∫⁻ a, ⨆ n, g n a ∂μ := lintegral_congr_ae <\| g_eq_f.mono fun a ha => by simp only [ha] _ = ⨆ n, ∫⁻ a, g n a ∂μ := (lintegral_iSup (fun n => measurable_const.piecewise hs.2.1 (hf n)) (monotone_nat_of_le_succ fun n a => ?_)) _ = ⨆ n, ∫⁻ a, f n a ∂μ := by simp only [lintegral_congr_ae (g_eq_f.mono fun _a ha => ha _)] simp only [g] split_ifs with h · rfl · have := Set.not_mem_subset hs.1 h simp only [not_forall, not_le, mem_setOf_eq, not_exists, not_lt] at this exact this n #align measure_theory.lintegral_supr_ae MeasureTheory.lintegral_iSup_ae theorem lintegral_sub' {f g : α → ℝ≥0∞} (hg : AEMeasurable g μ) (hg_fin : ∫⁻ a, g a ∂μ ≠ ∞) (h_le : g ≤ᵐ[μ] f) : ∫⁻ a, f a - g a ∂μ = ∫⁻ a, f a ∂μ - ∫⁻ a, g a ∂μ := by refine ENNReal.eq_sub_of_add_eq hg_fin ?_ rw [← lintegral_add_right' _ hg] exact lintegral_congr_ae (h_le.mono fun x hx => tsub_add_cancel_of_le hx) #align measure_theory.lintegral_sub' MeasureTheory.lintegral_sub' theorem lintegral_sub {f g : α → ℝ≥0∞} (hg : Measurable g) (hg_fin : ∫⁻ a, g a ∂μ ≠ ∞) (h_le : g ≤ᵐ[μ] f) : ∫⁻ a, f a - g a ∂μ = ∫⁻ a, f a ∂μ - ∫⁻ a, g a ∂μ := lintegral_sub' hg.aemeasurable hg_fin h_le #align measure_theory.lintegral_sub MeasureTheory.lintegral_sub theorem lintegral_sub_le' (f g : α → ℝ≥0∞) (hf : AEMeasurable f μ) : ∫⁻ x, g x ∂μ - ∫⁻ x, f x ∂μ ≤ ∫⁻ x, g x - f x ∂μ := by rw [tsub_le_iff_right] by_cases hfi : ∫⁻ x, f x ∂μ = ∞ · rw [hfi, add_top] exact le_top · rw [← lintegral_add_right' _ hf] gcongr exact le_tsub_add #align measure_theory.lintegral_sub_le' MeasureTheory.lintegral_sub_le' theorem lintegral_sub_le (f g : α → ℝ≥0∞) (hf : Measurable f) : ∫⁻ x, g x ∂μ - ∫⁻ x, f x ∂μ ≤ ∫⁻ x, g x - f x ∂μ := lintegral_sub_le' f g hf.aemeasurable #align measure_theory.lintegral_sub_le MeasureTheory.lintegral_sub_le theorem lintegral_strict_mono_of_ae_le_of_frequently_ae_lt {f g : α → ℝ≥0∞} (hg : AEMeasurable g μ) (hfi : ∫⁻ x, f x ∂μ ≠ ∞) (h_le : f ≤ᵐ[μ] g) (h : ∃ᵐ x ∂μ, f x ≠ g x) : ∫⁻ x, f x ∂μ < ∫⁻ x, g x ∂μ := by contrapose! h simp only [not_frequently, Ne, Classical.not_not] exact ae_eq_of_ae_le_of_lintegral_le h_le hfi hg h #align measure_theory.lintegral_strict_mono_of_ae_le_of_frequently_ae_lt MeasureTheory.lintegral_strict_mono_of_ae_le_of_frequently_ae_lt theorem lintegral_strict_mono_of_ae_le_of_ae_lt_on {f g : α → ℝ≥0∞} (hg : AEMeasurable g μ) (hfi : ∫⁻ x, f x ∂μ ≠ ∞) (h_le : f ≤ᵐ[μ] g) {s : Set α} (hμs : μ s ≠ 0) (h : ∀ᵐ x ∂μ, x ∈ s → f x < g x) : ∫⁻ x, f x ∂μ < ∫⁻ x, g x ∂μ := lintegral_strict_mono_of_ae_le_of_frequently_ae_lt hg hfi h_le <\| ((frequently_ae_mem_iff.2 hμs).and_eventually h).mono fun _x hx => (hx.2 hx.1).ne #align measure_theory.lintegral_strict_mono_of_ae_le_of_ae_lt_on MeasureTheory.lintegral_strict_mono_of_ae_le_of_ae_lt_on theorem lintegral_strict_mono {f g : α → ℝ≥0∞} (hμ : μ ≠ 0) (hg : AEMeasurable g μ) (hfi : ∫⁻ x, f x ∂μ ≠ ∞) (h : ∀ᵐ x ∂μ, f x < g x) : ∫⁻ x, f x ∂μ < ∫⁻ x, g x ∂μ := by rw [Ne, ← Measure.measure_univ_eq_zero] at hμ refine lintegral_strict_mono_of_ae_le_of_ae_lt_on hg hfi (ae_le_of_ae_lt h) hμ ?_ simpa using h #align measure_theory.lintegral_strict_mono MeasureTheory.lintegral_strict_mono theorem set_lintegral_strict_mono {f g : α → ℝ≥0∞} {s : Set α} (hsm : MeasurableSet s) (hs : μ s ≠ 0) (hg : Measurable g) (hfi : ∫⁻ x in s, f x ∂μ ≠ ∞) (h : ∀ᵐ x ∂μ, x ∈ s → f x < g x) : ∫⁻ x in s, f x ∂μ < ∫⁻ x in s, g x ∂μ := lintegral_strict_mono (by simp [hs]) hg.aemeasurable hfi ((ae_restrict_iff' hsm).mpr h) #align measure_theory.set_lintegral_strict_mono MeasureTheory.set_lintegral_strict_mono theorem lintegral_iInf_ae {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, Measurable (f n)) (h_mono : ∀ n : ℕ, f n.succ ≤ᵐ[μ] f n) (h_fin : ∫⁻ a, f 0 a ∂μ ≠ ∞) : ∫⁻ a, ⨅ n, f n a ∂μ = ⨅ n, ∫⁻ a, f n a ∂μ := have fn_le_f0 : ∫⁻ a, ⨅ n, f n a ∂μ ≤ ∫⁻ a, f 0 a ∂μ := lintegral_mono fun a => iInf_le_of_le 0 le_rfl have fn_le_f0' : ⨅ n, ∫⁻ a, f n a ∂μ ≤ ∫⁻ a, f 0 a ∂μ := iInf_le_of_le 0 le_rfl (ENNReal.sub_right_inj h_fin fn_le_f0 fn_le_f0').1 <\| show ∫⁻ a, f 0 a ∂μ - ∫⁻ a, ⨅ n, f n a ∂μ = ∫⁻ a, f 0 a ∂μ - ⨅ n, ∫⁻ a, f n a ∂μ from calc ∫⁻ a, f 0 a ∂μ - ∫⁻ a, ⨅ n, f n a ∂μ = ∫⁻ a, f 0 a - ⨅ n, f n a ∂μ := (lintegral_sub (measurable_iInf h_meas) (ne_top_of_le_ne_top h_fin <\| lintegral_mono fun a => iInf_le _ _) (ae_of_all _ fun a => iInf_le _ _)).symm _ = ∫⁻ a, ⨆ n, f 0 a - f n a ∂μ := congr rfl (funext fun a => ENNReal.sub_iInf) _ = ⨆ n, ∫⁻ a, f 0 a - f n a ∂μ := (lintegral_iSup_ae (fun n => (h_meas 0).sub (h_meas n)) fun n => (h_mono n).mono fun a ha => tsub_le_tsub le_rfl ha) _ = ⨆ n, ∫⁻ a, f 0 a ∂μ - ∫⁻ a, f n a ∂μ := (have h_mono : ∀ᵐ a ∂μ, ∀ n : ℕ, f n.succ a ≤ f n a := ae_all_iff.2 h_mono have h_mono : ∀ n, ∀ᵐ a ∂μ, f n a ≤ f 0 a := fun n => h_mono.mono fun a h => by induction' n with n ih · exact le_rfl · exact le_trans (h n) ih congr_arg iSup <\| funext fun n => lintegral_sub (h_meas _) (ne_top_of_le_ne_top h_fin <\| lintegral_mono_ae <\| h_mono n) (h_mono n)) _ = ∫⁻ a, f 0 a ∂μ - ⨅ n, ∫⁻ a, f n a ∂μ := ENNReal.sub_iInf.symm #align measure_theory.lintegral_infi_ae MeasureTheory.lintegral_iInf_ae theorem lintegral_iInf {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, Measurable (f n)) (h_anti : Antitone f) (h_fin : ∫⁻ a, f 0 a ∂μ ≠ ∞) : ∫⁻ a, ⨅ n, f n a ∂μ = ⨅ n, ∫⁻ a, f n a ∂μ := lintegral_iInf_ae h_meas (fun n => ae_of_all _ <\| h_anti n.le_succ) h_fin #align measure_theory.lintegral_infi MeasureTheory.lintegral_iInf theorem lintegral_iInf' {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, AEMeasurable (f n) μ) (h_anti : ∀ᵐ a ∂μ, Antitone (fun i ↦ f i a)) (h_fin : ∫⁻ a, f 0 a ∂μ ≠ ∞) : ∫⁻ a, ⨅ n, f n a ∂μ = ⨅ n, ∫⁻ a, f n a ∂μ := by simp_rw [← iInf_apply] let p : α → (ℕ → ℝ≥0∞) → Prop := fun _ f' => Antitone f' have hp : ∀ᵐ x ∂μ, p x fun i => f i x := h_anti have h_ae_seq_mono : Antitone (aeSeq h_meas p) := by intro n m hnm x by_cases hx : x ∈ aeSeqSet h_meas p · exact aeSeq.prop_of_mem_aeSeqSet h_meas hx hnm · simp only [aeSeq, hx, if_false] exact le_rfl rw [lintegral_congr_ae (aeSeq.iInf h_meas hp).symm] simp_rw [iInf_apply] rw [lintegral_iInf (aeSeq.measurable h_meas p) h_ae_seq_mono] · congr exact funext fun n ↦ lintegral_congr_ae (aeSeq.aeSeq_n_eq_fun_n_ae h_meas hp n) · rwa [lintegral_congr_ae (aeSeq.aeSeq_n_eq_fun_n_ae h_meas hp 0)] theorem lintegral_iInf_directed_of_measurable {mα : MeasurableSpace α} [Countable β] {f : β → α → ℝ≥0∞} {μ : Measure α} (hμ : μ ≠ 0) (hf : ∀ b, Measurable (f b)) (hf_int : ∀ b, ∫⁻ a, f b a ∂μ ≠ ∞) (h_directed : Directed (· ≥ ·) f) : ∫⁻ a, ⨅ b, f b a ∂μ = ⨅ b, ∫⁻ a, f b a ∂μ := by cases nonempty_encodable β cases isEmpty_or_nonempty β · simp only [iInf_of_empty, lintegral_const, ENNReal.top_mul (Measure.measure_univ_ne_zero.mpr hμ)] inhabit β have : ∀ a, ⨅ b, f b a = ⨅ n, f (h_directed.sequence f n) a := by refine fun a => le_antisymm (le_iInf fun n => iInf_le _ _) (le_iInf fun b => iInf_le_of_le (Encodable.encode b + 1) ?_) exact h_directed.sequence_le b a -- Porting note: used `∘` below to deal with its reduced reducibility calc ∫⁻ a, ⨅ b, f b a ∂μ _ = ∫⁻ a, ⨅ n, (f ∘ h_directed.sequence f) n a ∂μ := by simp only [this, Function.comp_apply] _ = ⨅ n, ∫⁻ a, (f ∘ h_directed.sequence f) n a ∂μ := by rw [lintegral_iInf ?_ h_directed.sequence_anti] · exact hf_int _ · exact fun n => hf _ _ = ⨅ b, ∫⁻ a, f b a ∂μ := by refine le_antisymm (le_iInf fun b => ?_) (le_iInf fun n => ?_) · exact iInf_le_of_le (Encodable.encode b + 1) (lintegral_mono <\| h_directed.sequence_le b) · exact iInf_le (fun b => ∫⁻ a, f b a ∂μ) _ #align lintegral_infi_directed_of_measurable MeasureTheory.lintegral_iInf_directed_of_measurable theorem lintegral_liminf_le' {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, AEMeasurable (f n) μ) : ∫⁻ a, liminf (fun n => f n a) atTop ∂μ ≤ liminf (fun n => ∫⁻ a, f n a ∂μ) atTop := calc ∫⁻ a, liminf (fun n => f n a) atTop ∂μ = ∫⁻ a, ⨆ n : ℕ, ⨅ i ≥ n, f i a ∂μ := by simp only [liminf_eq_iSup_iInf_of_nat] _ = ⨆ n : ℕ, ∫⁻ a, ⨅ i ≥ n, f i a ∂μ := (lintegral_iSup' (fun n => aemeasurable_biInf _ (to_countable _) (fun i _ ↦ h_meas i)) (ae_of_all μ fun a n m hnm => iInf_le_iInf_of_subset fun i hi => le_trans hnm hi)) _ ≤ ⨆ n : ℕ, ⨅ i ≥ n, ∫⁻ a, f i a ∂μ := iSup_mono fun n => le_iInf₂_lintegral _ _ = atTop.liminf fun n => ∫⁻ a, f n a ∂μ := Filter.liminf_eq_iSup_iInf_of_nat.symm #align measure_theory.lintegral_liminf_le' MeasureTheory.lintegral_liminf_le' theorem lintegral_liminf_le {f : ℕ → α → ℝ≥0∞} (h_meas : ∀ n, Measurable (f n)) : ∫⁻ a, liminf (fun n => f n a) atTop ∂μ ≤ liminf (fun n => ∫⁻ a, f n a ∂μ) atTop := lintegral_liminf_le' fun n => (h_meas n).aemeasurable #align measure_theory.lintegral_liminf_le MeasureTheory.lintegral_liminf_le theorem limsup_lintegral_le {f : ℕ → α → ℝ≥0∞} {g : α → ℝ≥0∞} (hf_meas : ∀ n, Measurable (f n)) (h_bound : ∀ n, f n ≤ᵐ[μ] g) (h_fin : ∫⁻ a, g a ∂μ ≠ ∞) : limsup (fun n => ∫⁻ a, f n a ∂μ) atTop ≤ ∫⁻ a, limsup (fun n => f n a) atTop ∂μ := calc limsup (fun n => ∫⁻ a, f n a ∂μ) atTop = ⨅ n : ℕ, ⨆ i ≥ n, ∫⁻ a, f i a ∂μ := limsup_eq_iInf_iSup_of_nat _ ≤ ⨅ n : ℕ, ∫⁻ a, ⨆ i ≥ n, f i a ∂μ := iInf_mono fun n => iSup₂_lintegral_le _ _ = ∫⁻ a, ⨅ n : ℕ, ⨆ i ≥ n, f i a ∂μ := by refine (lintegral_iInf ?_ ?_ ?_).symm · intro n exact measurable_biSup _ (to_countable _) (fun i _ ↦ hf_meas i) · intro n m hnm a exact iSup_le_iSup_of_subset fun i hi => le_trans hnm hi · refine ne_top_of_le_ne_top h_fin (lintegral_mono_ae ?_) refine (ae_all_iff.2 h_bound).mono fun n hn => ?_ exact iSup_le fun i => iSup_le fun _ => hn i _ = ∫⁻ a, limsup (fun n => f n a) atTop ∂μ := by simp only [limsup_eq_iInf_iSup_of_nat] #align measure_theory.limsup_lintegral_le MeasureTheory.limsup_lintegral_le theorem tendsto_lintegral_of_dominated_convergence {F : ℕ → α → ℝ≥0∞} {f : α → ℝ≥0∞} (bound : α → ℝ≥0∞) (hF_meas : ∀ n, Measurable (F n)) (h_bound : ∀ n, F n ≤ᵐ[μ] bound) (h_fin : ∫⁻ a, bound a ∂μ ≠ ∞) (h_lim : ∀ᵐ a ∂μ, Tendsto (fun n => F n a) atTop (𝓝 (f a))) : Tendsto (fun n => ∫⁻ a, F n a ∂μ) atTop (𝓝 (∫⁻ a, f a ∂μ)) := tendsto_of_le_liminf_of_limsup_le (calc ∫⁻ a, f a ∂μ = ∫⁻ a, liminf (fun n : ℕ => F n a) atTop ∂μ := lintegral_congr_ae <\| h_lim.mono fun a h => h.liminf_eq.symm _ ≤ liminf (fun n => ∫⁻ a, F n a ∂μ) atTop := lintegral_liminf_le hF_meas ) (calc limsup (fun n : ℕ => ∫⁻ a, F n a ∂μ) atTop ≤ ∫⁻ a, limsup (fun n => F n a) atTop ∂μ := limsup_lintegral_le hF_meas h_bound h_fin _ = ∫⁻ a, f a ∂μ := lintegral_congr_ae <\| h_lim.mono fun a h => h.limsup_eq ) #align measure_theory.tendsto_lintegral_of_dominated_convergence MeasureTheory.tendsto_lintegral_of_dominated_convergence theorem tendsto_lintegral_of_dominated_convergence' {F : ℕ → α → ℝ≥0∞} {f : α → ℝ≥0∞} (bound : α → ℝ≥0∞) (hF_meas : ∀ n, AEMeasurable (F n) μ) (h_bound : ∀ n, F n ≤ᵐ[μ] bound) (h_fin : ∫⁻ a, bound a ∂μ ≠ ∞) (h_lim : ∀ᵐ a ∂μ, Tendsto (fun n => F n a) atTop (𝓝 (f a))) : Tendsto (fun n => ∫⁻ a, F n a ∂μ) atTop (𝓝 (∫⁻ a, f a ∂μ)) := by have : ∀ n, ∫⁻ a, F n a ∂μ = ∫⁻ a, (hF_meas n).mk (F n) a ∂μ := fun n => lintegral_congr_ae (hF_meas n).ae_eq_mk simp_rw [this] apply tendsto_lintegral_of_dominated_convergence bound (fun n => (hF_meas n).measurable_mk) _ h_fin · have : ∀ n, ∀ᵐ a ∂μ, (hF_meas n).mk (F n) a = F n a := fun n => (hF_meas n).ae_eq_mk.symm have : ∀ᵐ a ∂μ, ∀ n, (hF_meas n).mk (F n) a = F n a := ae_all_iff.mpr this filter_upwards [this, h_lim] with a H H' simp_rw [H] exact H' · intro n filter_upwards [h_bound n, (hF_meas n).ae_eq_mk] with a H H' rwa [H'] at H #align measure_theory.tendsto_lintegral_of_dominated_convergence' MeasureTheory.tendsto_lintegral_of_dominated_convergence' theorem tendsto_lintegral_filter_of_dominated_convergence {ι} {l : Filter ι} [l.IsCountablyGenerated] {F : ι → α → ℝ≥0∞} {f : α → ℝ≥0∞} (bound : α → ℝ≥0∞) (hF_meas : ∀ᶠ n in l, Measurable (F n)) (h_bound : ∀ᶠ n in l, ∀ᵐ a ∂μ, F n a ≤ bound a) (h_fin : ∫⁻ a, bound a ∂μ ≠ ∞) (h_lim : ∀ᵐ a ∂μ, Tendsto (fun n => F n a) l (𝓝 (f a))) : Tendsto (fun n => ∫⁻ a, F n a ∂μ) l (𝓝 <\| ∫⁻ a, f a ∂μ) := by rw [tendsto_iff_seq_tendsto] intro x xl have hxl := by rw [tendsto_atTop'] at xl exact xl have h := inter_mem hF_meas h_bound replace h := hxl _ h rcases h with ⟨k, h⟩ rw [← tendsto_add_atTop_iff_nat k] refine tendsto_lintegral_of_dominated_convergence ?_ ?_ ?_ ?_ ?_ · exact bound · intro refine (h _ ?_).1 exact Nat.le_add_left _ _ · intro refine (h _ ?_).2 exact Nat.le_add_left _ _ · assumption · refine h_lim.mono fun a h_lim => ?_ apply @Tendsto.comp _ _ _ (fun n => x (n + k)) fun n => F n a · assumption rw [tendsto_add_atTop_iff_nat] assumption #align measure_theory.tendsto_lintegral_filter_of_dominated_convergence MeasureTheory.tendsto_lintegral_filter_of_dominated_convergence theorem lintegral_tendsto_of_tendsto_of_antitone {f : ℕ → α → ℝ≥0∞} {F : α → ℝ≥0∞} (hf : ∀ n, AEMeasurable (f n) μ) (h_anti : ∀ᵐ x ∂μ, Antitone fun n ↦ f n x) (h0 : ∫⁻ a, f 0 a ∂μ ≠ ∞) (h_tendsto : ∀ᵐ x ∂μ, Tendsto (fun n ↦ f n x) atTop (𝓝 (F x))) : Tendsto (fun n ↦ ∫⁻ x, f n x ∂μ) atTop (𝓝 (∫⁻ x, F x ∂μ)) := by have : Antitone fun n ↦ ∫⁻ x, f n x ∂μ := fun i j hij ↦ lintegral_mono_ae (h_anti.mono fun x hx ↦ hx hij) suffices key : ∫⁻ x, F x ∂μ = ⨅ n, ∫⁻ x, f n x ∂μ by rw [key] exact tendsto_atTop_iInf this rw [← lintegral_iInf' hf h_anti h0] refine lintegral_congr_ae ?_ filter_upwards [h_anti, h_tendsto] with _ hx_anti hx_tendsto using tendsto_nhds_unique hx_tendsto (tendsto_atTop_iInf hx_anti) section open Encodable theorem lintegral_iSup_directed_of_measurable [Countable β] {f : β → α → ℝ≥0∞} (hf : ∀ b, Measurable (f b)) (h_directed : Directed (· ≤ ·) f) : ∫⁻ a, ⨆ b, f b a ∂μ = ⨆ b, ∫⁻ a, f b a ∂μ := by cases nonempty_encodable β cases isEmpty_or_nonempty β · simp [iSup_of_empty] inhabit β have : ∀ a, ⨆ b, f b a = ⨆ n, f (h_directed.sequence f n) a := by intro a refine le_antisymm (iSup_le fun b => ?_) (iSup_le fun n => le_iSup (fun n => f n a) _) exact le_iSup_of_le (encode b + 1) (h_directed.le_sequence b a) calc ∫⁻ a, ⨆ b, f b a ∂μ = ∫⁻ a, ⨆ n, f (h_directed.sequence f n) a ∂μ := by simp only [this] _ = ⨆ n, ∫⁻ a, f (h_directed.sequence f n) a ∂μ := (lintegral_iSup (fun n => hf _) h_directed.sequence_mono) _ = ⨆ b, ∫⁻ a, f b a ∂μ := by refine le_antisymm (iSup_le fun n => ?_) (iSup_le fun b => ?_) · exact le_iSup (fun b => ∫⁻ a, f b a ∂μ) _ · exact le_iSup_of_le (encode b + 1) (lintegral_mono <\| h_directed.le_sequence b) #align measure_theory.lintegral_supr_directed_of_measurable MeasureTheory.lintegral_iSup_directed_of_measurable theorem lintegral_iSup_directed [Countable β] {f : β → α → ℝ≥0∞} (hf : ∀ b, AEMeasurable (f b) μ) (h_directed : Directed (· ≤ ·) f) : ∫⁻ a, ⨆ b, f b a ∂μ = ⨆ b, ∫⁻ a, f b a ∂μ := by simp_rw [← iSup_apply] let p : α → (β → ENNReal) → Prop := fun x f' => Directed LE.le f' have hp : ∀ᵐ x ∂μ, p x fun i => f i x := by filter_upwards [] with x i j obtain ⟨z, hz₁, hz₂⟩ := h_directed i j exact ⟨z, hz₁ x, hz₂ x⟩ have h_ae_seq_directed : Directed LE.le (aeSeq hf p) := by intro b₁ b₂ obtain ⟨z, hz₁, hz₂⟩ := h_directed b₁ b₂ refine ⟨z, ?_, ?_⟩ <;> · intro x by_cases hx : x ∈ aeSeqSet hf p · repeat rw [aeSeq.aeSeq_eq_fun_of_mem_aeSeqSet hf hx] apply_rules [hz₁, hz₂] · simp only [aeSeq, hx, if_false] exact le_rfl convert lintegral_iSup_directed_of_measurable (aeSeq.measurable hf p) h_ae_seq_directed using 1 · simp_rw [← iSup_apply] rw [lintegral_congr_ae (aeSeq.iSup hf hp).symm] · congr 1 ext1 b rw [lintegral_congr_ae] apply EventuallyEq.symm exact aeSeq.aeSeq_n_eq_fun_n_ae hf hp _ #align measure_theory.lintegral_supr_directed MeasureTheory.lintegral_iSup_directed end theorem lintegral_tsum [Countable β] {f : β → α → ℝ≥0∞} (hf : ∀ i, AEMeasurable (f i) μ) : ∫⁻ a, ∑' i, f i a ∂μ = ∑' i, ∫⁻ a, f i a ∂μ := by simp only [ENNReal.tsum_eq_iSup_sum] rw [lintegral_iSup_directed] · simp [lintegral_finset_sum' _ fun i _ => hf i] · intro b exact Finset.aemeasurable_sum _ fun i _ => hf i · intro s t use s ∪ t constructor · exact fun a => Finset.sum_le_sum_of_subset Finset.subset_union_left · exact fun a => Finset.sum_le_sum_of_subset Finset.subset_union_right #align measure_theory.lintegral_tsum MeasureTheory.lintegral_tsum open Measure theorem lintegral_iUnion₀ [Countable β] {s : β → Set α} (hm : ∀ i, NullMeasurableSet (s i) μ) (hd : Pairwise (AEDisjoint μ on s)) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i, s i, f a ∂μ = ∑' i, ∫⁻ a in s i, f a ∂μ := by simp only [Measure.restrict_iUnion_ae hd hm, lintegral_sum_measure] #align measure_theory.lintegral_Union₀ MeasureTheory.lintegral_iUnion₀ theorem lintegral_iUnion [Countable β] {s : β → Set α} (hm : ∀ i, MeasurableSet (s i)) (hd : Pairwise (Disjoint on s)) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i, s i, f a ∂μ = ∑' i, ∫⁻ a in s i, f a ∂μ := lintegral_iUnion₀ (fun i => (hm i).nullMeasurableSet) hd.aedisjoint f #align measure_theory.lintegral_Union MeasureTheory.lintegral_iUnion theorem lintegral_biUnion₀ {t : Set β} {s : β → Set α} (ht : t.Countable) (hm : ∀ i ∈ t, NullMeasurableSet (s i) μ) (hd : t.Pairwise (AEDisjoint μ on s)) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i ∈ t, s i, f a ∂μ = ∑' i : t, ∫⁻ a in s i, f a ∂μ := by haveI := ht.toEncodable rw [biUnion_eq_iUnion, lintegral_iUnion₀ (SetCoe.forall'.1 hm) (hd.subtype _ _)] #align measure_theory.lintegral_bUnion₀ MeasureTheory.lintegral_biUnion₀ theorem lintegral_biUnion {t : Set β} {s : β → Set α} (ht : t.Countable) (hm : ∀ i ∈ t, MeasurableSet (s i)) (hd : t.PairwiseDisjoint s) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i ∈ t, s i, f a ∂μ = ∑' i : t, ∫⁻ a in s i, f a ∂μ := lintegral_biUnion₀ ht (fun i hi => (hm i hi).nullMeasurableSet) hd.aedisjoint f #align measure_theory.lintegral_bUnion MeasureTheory.lintegral_biUnion theorem lintegral_biUnion_finset₀ {s : Finset β} {t : β → Set α} (hd : Set.Pairwise (↑s) (AEDisjoint μ on t)) (hm : ∀ b ∈ s, NullMeasurableSet (t b) μ) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ b ∈ s, t b, f a ∂μ = ∑ b ∈ s, ∫⁻ a in t b, f a ∂μ := by simp only [← Finset.mem_coe, lintegral_biUnion₀ s.countable_toSet hm hd, ← Finset.tsum_subtype'] #align measure_theory.lintegral_bUnion_finset₀ MeasureTheory.lintegral_biUnion_finset₀ theorem lintegral_biUnion_finset {s : Finset β} {t : β → Set α} (hd : Set.PairwiseDisjoint (↑s) t) (hm : ∀ b ∈ s, MeasurableSet (t b)) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ b ∈ s, t b, f a ∂μ = ∑ b ∈ s, ∫⁻ a in t b, f a ∂μ := lintegral_biUnion_finset₀ hd.aedisjoint (fun b hb => (hm b hb).nullMeasurableSet) f #align measure_theory.lintegral_bUnion_finset MeasureTheory.lintegral_biUnion_finset theorem lintegral_iUnion_le [Countable β] (s : β → Set α) (f : α → ℝ≥0∞) : ∫⁻ a in ⋃ i, s i, f a ∂μ ≤ ∑' i, ∫⁻ a in s i, f a ∂μ := by rw [← lintegral_sum_measure] exact lintegral_mono' restrict_iUnion_le le_rfl #align measure_theory.lintegral_Union_le MeasureTheory.lintegral_iUnion_le theorem lintegral_union {f : α → ℝ≥0∞} {A B : Set α} (hB : MeasurableSet B) (hAB : Disjoint A B) : ∫⁻ a in A ∪ B, f a ∂μ = ∫⁻ a in A, f a ∂μ + ∫⁻ a in B, f a ∂μ := by rw [restrict_union hAB hB, lintegral_add_measure] #align measure_theory.lintegral_union MeasureTheory.lintegral_union theorem lintegral_union_le (f : α → ℝ≥0∞) (s t : Set α) : ∫⁻ a in s ∪ t, f a ∂μ ≤ ∫⁻ a in s, f a ∂μ + ∫⁻ a in t, f a ∂μ := by rw [← lintegral_add_measure] exact lintegral_mono' (restrict_union_le _ _) le_rfl theorem lintegral_inter_add_diff {B : Set α} (f : α → ℝ≥0∞) (A : Set α) (hB : MeasurableSet B) : ∫⁻ x in A ∩ B, f x ∂μ + ∫⁻ x in A \ B, f x ∂μ = ∫⁻ x in A, f x ∂μ := by rw [← lintegral_add_measure, restrict_inter_add_diff _ hB] #align measure_theory.lintegral_inter_add_diff MeasureTheory.lintegral_inter_add_diff theorem lintegral_add_compl (f : α → ℝ≥0∞) {A : Set α} (hA : MeasurableSet A) : ∫⁻ x in A, f x ∂μ + ∫⁻ x in Aᶜ, f x ∂μ = ∫⁻ x, f x ∂μ := by rw [← lintegral_add_measure, Measure.restrict_add_restrict_compl hA] #align measure_theory.lintegral_add_compl MeasureTheory.lintegral_add_compl theorem lintegral_max {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) : ∫⁻ x, max (f x) (g x) ∂μ = ∫⁻ x in { x \| f x ≤ g x }, g x ∂μ + ∫⁻ x in { x \| g x < f x }, f x ∂μ := by have hm : MeasurableSet { x \| f x ≤ g x } := measurableSet_le hf hg rw [← lintegral_add_compl (fun x => max (f x) (g x)) hm] simp only [← compl_setOf, ← not_le] refine congr_arg₂ (· + ·) (set_lintegral_congr_fun hm ?_) (set_lintegral_congr_fun hm.compl ?_) exacts [ae_of_all _ fun x => max_eq_right (a := f x) (b := g x), ae_of_all _ fun x (hx : ¬ f x ≤ g x) => max_eq_left (not_le.1 hx).le] #align measure_theory.lintegral_max MeasureTheory.lintegral_max theorem set_lintegral_max {f g : α → ℝ≥0∞} (hf : Measurable f) (hg : Measurable g) (s : Set α) : ∫⁻ x in s, max (f x) (g x) ∂μ = ∫⁻ x in s ∩ { x \| f x ≤ g x }, g x ∂μ + ∫⁻ x in s ∩ { x \| g x < f x }, f x ∂μ := by rw [lintegral_max hf hg, restrict_restrict, restrict_restrict, inter_comm s, inter_comm s] exacts [measurableSet_lt hg hf, measurableSet_le hf hg] #align measure_theory.set_lintegral_max MeasureTheory.set_lintegral_max theorem lintegral_map {mβ : MeasurableSpace β} {f : β → ℝ≥0∞} {g : α → β} (hf : Measurable f) (hg : Measurable g) : ∫⁻ a, f a ∂map g μ = ∫⁻ a, f (g a) ∂μ := by erw [lintegral_eq_iSup_eapprox_lintegral hf, lintegral_eq_iSup_eapprox_lintegral (hf.comp hg)] congr with n : 1 convert SimpleFunc.lintegral_map _ hg ext1 x; simp only [eapprox_comp hf hg, coe_comp] #align measure_theory.lintegral_map MeasureTheory.lintegral_map theorem lintegral_map' {mβ : MeasurableSpace β} {f : β → ℝ≥0∞} {g : α → β} (hf : AEMeasurable f (Measure.map g μ)) (hg : AEMeasurable g μ) : ∫⁻ a, f a ∂Measure.map g μ = ∫⁻ a, f (g a) ∂μ := calc ∫⁻ a, f a ∂Measure.map g μ = ∫⁻ a, hf.mk f a ∂Measure.map g μ := lintegral_congr_ae hf.ae_eq_mk _ = ∫⁻ a, hf.mk f a ∂Measure.map (hg.mk g) μ := by congr 1 exact Measure.map_congr hg.ae_eq_mk _ = ∫⁻ a, hf.mk f (hg.mk g a) ∂μ := lintegral_map hf.measurable_mk hg.measurable_mk _ = ∫⁻ a, hf.mk f (g a) ∂μ := lintegral_congr_ae <\| hg.ae_eq_mk.symm.fun_comp _ _ = ∫⁻ a, f (g a) ∂μ := lintegral_congr_ae (ae_eq_comp hg hf.ae_eq_mk.symm) #align measure_theory.lintegral_map' MeasureTheory.lintegral_map' theorem lintegral_map_le {mβ : MeasurableSpace β} (f : β → ℝ≥0∞) {g : α → β} (hg : Measurable g) : ∫⁻ a, f a ∂Measure.map g μ ≤ ∫⁻ a, f (g a) ∂μ := by rw [← iSup_lintegral_measurable_le_eq_lintegral, ← iSup_lintegral_measurable_le_eq_lintegral] refine iSup₂_le fun i hi => iSup_le fun h'i => ?_ refine le_iSup₂_of_le (i ∘ g) (hi.comp hg) ?_ exact le_iSup_of_le (fun x => h'i (g x)) (le_of_eq (lintegral_map hi hg)) #align measure_theory.lintegral_map_le MeasureTheory.lintegral_map_le theorem lintegral_comp [MeasurableSpace β] {f : β → ℝ≥0∞} {g : α → β} (hf : Measurable f) (hg : Measurable g) : lintegral μ (f ∘ g) = ∫⁻ a, f a ∂map g μ := (lintegral_map hf hg).symm #align measure_theory.lintegral_comp MeasureTheory.lintegral_comp theorem set_lintegral_map [MeasurableSpace β] {f : β → ℝ≥0∞} {g : α → β} {s : Set β} (hs : MeasurableSet s) (hf : Measurable f) (hg : Measurable g) : ∫⁻ y in s, f y ∂map g μ = ∫⁻ x in g ⁻¹' s, f (g x) ∂μ := by rw [restrict_map hg hs, lintegral_map hf hg] #align measure_theory.set_lintegral_map MeasureTheory.set_lintegral_map theorem lintegral_indicator_const_comp {mβ : MeasurableSpace β} {f : α → β} {s : Set β} (hf : Measurable f) (hs : MeasurableSet s) (c : ℝ≥0∞) : ∫⁻ a, s.indicator (fun _ => c) (f a) ∂μ = c * μ (f ⁻¹' s) := by erw [lintegral_comp (measurable_const.indicator hs) hf, lintegral_indicator_const hs, Measure.map_apply hf hs] #align measure_theory.lintegral_indicator_const_comp MeasureTheory.lintegral_indicator_const_comp	Mathlib/MeasureTheory/Integral/Lebesgue.lean	1,437	1,447	theorem _root_.MeasurableEmbedding.lintegral_map [MeasurableSpace β] {g : α → β} (hg : MeasurableEmbedding g) (f : β → ℝ≥0∞) : ∫⁻ a, f a ∂map g μ = ∫⁻ a, f (g a) ∂μ := by	rw [lintegral, lintegral] refine le_antisymm (iSup₂_le fun f₀ hf₀ => ?_) (iSup₂_le fun f₀ hf₀ => ?_) · rw [SimpleFunc.lintegral_map _ hg.measurable] have : (f₀.comp g hg.measurable : α → ℝ≥0∞) ≤ f ∘ g := fun x => hf₀ (g x) exact le_iSup_of_le (comp f₀ g hg.measurable) (by exact le_iSup (α := ℝ≥0∞) _ this) · rw [← f₀.extend_comp_eq hg (const _ 0), ← SimpleFunc.lintegral_map, ← SimpleFunc.lintegral_eq_lintegral, ← lintegral] refine lintegral_mono_ae (hg.ae_map_iff.2 <\| eventually_of_forall fun x => ?_) exact (extend_apply _ _ _ _).trans_le (hf₀ _)
import Mathlib.Order.Interval.Set.Basic import Mathlib.Data.Set.NAry import Mathlib.Order.Directed #align_import order.bounds.basic from "leanprover-community/mathlib"@"b1abe23ae96fef89ad30d9f4362c307f72a55010" open Function Set open OrderDual (toDual ofDual) universe u v w x variable {α : Type u} {β : Type v} {γ : Type w} {ι : Sort x} section variable [Preorder α] [Preorder β] {s t : Set α} {a b : α} def upperBounds (s : Set α) : Set α := { x \| ∀ ⦃a⦄, a ∈ s → a ≤ x } #align upper_bounds upperBounds def lowerBounds (s : Set α) : Set α := { x \| ∀ ⦃a⦄, a ∈ s → x ≤ a } #align lower_bounds lowerBounds def BddAbove (s : Set α) := (upperBounds s).Nonempty #align bdd_above BddAbove def BddBelow (s : Set α) := (lowerBounds s).Nonempty #align bdd_below BddBelow def IsLeast (s : Set α) (a : α) : Prop := a ∈ s ∧ a ∈ lowerBounds s #align is_least IsLeast def IsGreatest (s : Set α) (a : α) : Prop := a ∈ s ∧ a ∈ upperBounds s #align is_greatest IsGreatest def IsLUB (s : Set α) : α → Prop := IsLeast (upperBounds s) #align is_lub IsLUB def IsGLB (s : Set α) : α → Prop := IsGreatest (lowerBounds s) #align is_glb IsGLB theorem mem_upperBounds : a ∈ upperBounds s ↔ ∀ x ∈ s, x ≤ a := Iff.rfl #align mem_upper_bounds mem_upperBounds theorem mem_lowerBounds : a ∈ lowerBounds s ↔ ∀ x ∈ s, a ≤ x := Iff.rfl #align mem_lower_bounds mem_lowerBounds lemma mem_upperBounds_iff_subset_Iic : a ∈ upperBounds s ↔ s ⊆ Iic a := Iff.rfl #align mem_upper_bounds_iff_subset_Iic mem_upperBounds_iff_subset_Iic lemma mem_lowerBounds_iff_subset_Ici : a ∈ lowerBounds s ↔ s ⊆ Ici a := Iff.rfl #align mem_lower_bounds_iff_subset_Ici mem_lowerBounds_iff_subset_Ici theorem bddAbove_def : BddAbove s ↔ ∃ x, ∀ y ∈ s, y ≤ x := Iff.rfl #align bdd_above_def bddAbove_def theorem bddBelow_def : BddBelow s ↔ ∃ x, ∀ y ∈ s, x ≤ y := Iff.rfl #align bdd_below_def bddBelow_def theorem bot_mem_lowerBounds [OrderBot α] (s : Set α) : ⊥ ∈ lowerBounds s := fun _ _ => bot_le #align bot_mem_lower_bounds bot_mem_lowerBounds theorem top_mem_upperBounds [OrderTop α] (s : Set α) : ⊤ ∈ upperBounds s := fun _ _ => le_top #align top_mem_upper_bounds top_mem_upperBounds @[simp] theorem isLeast_bot_iff [OrderBot α] : IsLeast s ⊥ ↔ ⊥ ∈ s := and_iff_left <\| bot_mem_lowerBounds _ #align is_least_bot_iff isLeast_bot_iff @[simp] theorem isGreatest_top_iff [OrderTop α] : IsGreatest s ⊤ ↔ ⊤ ∈ s := and_iff_left <\| top_mem_upperBounds _ #align is_greatest_top_iff isGreatest_top_iff theorem not_bddAbove_iff' : ¬BddAbove s ↔ ∀ x, ∃ y ∈ s, ¬y ≤ x := by simp [BddAbove, upperBounds, Set.Nonempty] #align not_bdd_above_iff' not_bddAbove_iff' theorem not_bddBelow_iff' : ¬BddBelow s ↔ ∀ x, ∃ y ∈ s, ¬x ≤ y := @not_bddAbove_iff' αᵒᵈ _ _ #align not_bdd_below_iff' not_bddBelow_iff' theorem not_bddAbove_iff {α : Type} [LinearOrder α] {s : Set α} : ¬BddAbove s ↔ ∀ x, ∃ y ∈ s, x < y := by simp only [not_bddAbove_iff', not_le] #align not_bdd_above_iff not_bddAbove_iff theorem not_bddBelow_iff {α : Type} [LinearOrder α] {s : Set α} : ¬BddBelow s ↔ ∀ x, ∃ y ∈ s, y < x := @not_bddAbove_iff αᵒᵈ _ _ #align not_bdd_below_iff not_bddBelow_iff @[simp] lemma bddBelow_preimage_ofDual {s : Set α} : BddBelow (ofDual ⁻¹' s) ↔ BddAbove s := Iff.rfl @[simp] lemma bddAbove_preimage_ofDual {s : Set α} : BddAbove (ofDual ⁻¹' s) ↔ BddBelow s := Iff.rfl @[simp] lemma bddBelow_preimage_toDual {s : Set αᵒᵈ} : BddBelow (toDual ⁻¹' s) ↔ BddAbove s := Iff.rfl @[simp] lemma bddAbove_preimage_toDual {s : Set αᵒᵈ} : BddAbove (toDual ⁻¹' s) ↔ BddBelow s := Iff.rfl theorem BddAbove.dual (h : BddAbove s) : BddBelow (ofDual ⁻¹' s) := h #align bdd_above.dual BddAbove.dual theorem BddBelow.dual (h : BddBelow s) : BddAbove (ofDual ⁻¹' s) := h #align bdd_below.dual BddBelow.dual theorem IsLeast.dual (h : IsLeast s a) : IsGreatest (ofDual ⁻¹' s) (toDual a) := h #align is_least.dual IsLeast.dual theorem IsGreatest.dual (h : IsGreatest s a) : IsLeast (ofDual ⁻¹' s) (toDual a) := h #align is_greatest.dual IsGreatest.dual theorem IsLUB.dual (h : IsLUB s a) : IsGLB (ofDual ⁻¹' s) (toDual a) := h #align is_lub.dual IsLUB.dual theorem IsGLB.dual (h : IsGLB s a) : IsLUB (ofDual ⁻¹' s) (toDual a) := h #align is_glb.dual IsGLB.dual abbrev IsLeast.orderBot (h : IsLeast s a) : OrderBot s where bot := ⟨a, h.1⟩ bot_le := Subtype.forall.2 h.2 #align is_least.order_bot IsLeast.orderBot abbrev IsGreatest.orderTop (h : IsGreatest s a) : OrderTop s where top := ⟨a, h.1⟩ le_top := Subtype.forall.2 h.2 #align is_greatest.order_top IsGreatest.orderTop theorem upperBounds_mono_set ⦃s t : Set α⦄ (hst : s ⊆ t) : upperBounds t ⊆ upperBounds s := fun _ hb _ h => hb <\| hst h #align upper_bounds_mono_set upperBounds_mono_set theorem lowerBounds_mono_set ⦃s t : Set α⦄ (hst : s ⊆ t) : lowerBounds t ⊆ lowerBounds s := fun _ hb _ h => hb <\| hst h #align lower_bounds_mono_set lowerBounds_mono_set theorem upperBounds_mono_mem ⦃a b⦄ (hab : a ≤ b) : a ∈ upperBounds s → b ∈ upperBounds s := fun ha _ h => le_trans (ha h) hab #align upper_bounds_mono_mem upperBounds_mono_mem theorem lowerBounds_mono_mem ⦃a b⦄ (hab : a ≤ b) : b ∈ lowerBounds s → a ∈ lowerBounds s := fun hb _ h => le_trans hab (hb h) #align lower_bounds_mono_mem lowerBounds_mono_mem theorem upperBounds_mono ⦃s t : Set α⦄ (hst : s ⊆ t) ⦃a b⦄ (hab : a ≤ b) : a ∈ upperBounds t → b ∈ upperBounds s := fun ha => upperBounds_mono_set hst <\| upperBounds_mono_mem hab ha #align upper_bounds_mono upperBounds_mono theorem lowerBounds_mono ⦃s t : Set α⦄ (hst : s ⊆ t) ⦃a b⦄ (hab : a ≤ b) : b ∈ lowerBounds t → a ∈ lowerBounds s := fun hb => lowerBounds_mono_set hst <\| lowerBounds_mono_mem hab hb #align lower_bounds_mono lowerBounds_mono theorem BddAbove.mono ⦃s t : Set α⦄ (h : s ⊆ t) : BddAbove t → BddAbove s := Nonempty.mono <\| upperBounds_mono_set h #align bdd_above.mono BddAbove.mono theorem BddBelow.mono ⦃s t : Set α⦄ (h : s ⊆ t) : BddBelow t → BddBelow s := Nonempty.mono <\| lowerBounds_mono_set h #align bdd_below.mono BddBelow.mono theorem IsLUB.of_subset_of_superset {s t p : Set α} (hs : IsLUB s a) (hp : IsLUB p a) (hst : s ⊆ t) (htp : t ⊆ p) : IsLUB t a := ⟨upperBounds_mono_set htp hp.1, lowerBounds_mono_set (upperBounds_mono_set hst) hs.2⟩ #align is_lub.of_subset_of_superset IsLUB.of_subset_of_superset theorem IsGLB.of_subset_of_superset {s t p : Set α} (hs : IsGLB s a) (hp : IsGLB p a) (hst : s ⊆ t) (htp : t ⊆ p) : IsGLB t a := hs.dual.of_subset_of_superset hp hst htp #align is_glb.of_subset_of_superset IsGLB.of_subset_of_superset theorem IsLeast.mono (ha : IsLeast s a) (hb : IsLeast t b) (hst : s ⊆ t) : b ≤ a := hb.2 (hst ha.1) #align is_least.mono IsLeast.mono theorem IsGreatest.mono (ha : IsGreatest s a) (hb : IsGreatest t b) (hst : s ⊆ t) : a ≤ b := hb.2 (hst ha.1) #align is_greatest.mono IsGreatest.mono theorem IsLUB.mono (ha : IsLUB s a) (hb : IsLUB t b) (hst : s ⊆ t) : a ≤ b := IsLeast.mono hb ha <\| upperBounds_mono_set hst #align is_lub.mono IsLUB.mono theorem IsGLB.mono (ha : IsGLB s a) (hb : IsGLB t b) (hst : s ⊆ t) : b ≤ a := IsGreatest.mono hb ha <\| lowerBounds_mono_set hst #align is_glb.mono IsGLB.mono theorem subset_lowerBounds_upperBounds (s : Set α) : s ⊆ lowerBounds (upperBounds s) := fun _ hx _ hy => hy hx #align subset_lower_bounds_upper_bounds subset_lowerBounds_upperBounds theorem subset_upperBounds_lowerBounds (s : Set α) : s ⊆ upperBounds (lowerBounds s) := fun _ hx _ hy => hy hx #align subset_upper_bounds_lower_bounds subset_upperBounds_lowerBounds theorem Set.Nonempty.bddAbove_lowerBounds (hs : s.Nonempty) : BddAbove (lowerBounds s) := hs.mono (subset_upperBounds_lowerBounds s) #align set.nonempty.bdd_above_lower_bounds Set.Nonempty.bddAbove_lowerBounds theorem Set.Nonempty.bddBelow_upperBounds (hs : s.Nonempty) : BddBelow (upperBounds s) := hs.mono (subset_lowerBounds_upperBounds s) #align set.nonempty.bdd_below_upper_bounds Set.Nonempty.bddBelow_upperBounds theorem IsLeast.isGLB (h : IsLeast s a) : IsGLB s a := ⟨h.2, fun _ hb => hb h.1⟩ #align is_least.is_glb IsLeast.isGLB theorem IsGreatest.isLUB (h : IsGreatest s a) : IsLUB s a := ⟨h.2, fun _ hb => hb h.1⟩ #align is_greatest.is_lub IsGreatest.isLUB theorem IsLUB.upperBounds_eq (h : IsLUB s a) : upperBounds s = Ici a := Set.ext fun _ => ⟨fun hb => h.2 hb, fun hb => upperBounds_mono_mem hb h.1⟩ #align is_lub.upper_bounds_eq IsLUB.upperBounds_eq theorem IsGLB.lowerBounds_eq (h : IsGLB s a) : lowerBounds s = Iic a := h.dual.upperBounds_eq #align is_glb.lower_bounds_eq IsGLB.lowerBounds_eq theorem IsLeast.lowerBounds_eq (h : IsLeast s a) : lowerBounds s = Iic a := h.isGLB.lowerBounds_eq #align is_least.lower_bounds_eq IsLeast.lowerBounds_eq theorem IsGreatest.upperBounds_eq (h : IsGreatest s a) : upperBounds s = Ici a := h.isLUB.upperBounds_eq #align is_greatest.upper_bounds_eq IsGreatest.upperBounds_eq -- Porting note (#10756): new lemma theorem IsGreatest.lt_iff (h : IsGreatest s a) : a < b ↔ ∀ x ∈ s, x < b := ⟨fun hlt _x hx => (h.2 hx).trans_lt hlt, fun h' => h' _ h.1⟩ -- Porting note (#10756): new lemma theorem IsLeast.lt_iff (h : IsLeast s a) : b < a ↔ ∀ x ∈ s, b < x := h.dual.lt_iff theorem isLUB_le_iff (h : IsLUB s a) : a ≤ b ↔ b ∈ upperBounds s := by rw [h.upperBounds_eq] rfl #align is_lub_le_iff isLUB_le_iff theorem le_isGLB_iff (h : IsGLB s a) : b ≤ a ↔ b ∈ lowerBounds s := by rw [h.lowerBounds_eq] rfl #align le_is_glb_iff le_isGLB_iff theorem isLUB_iff_le_iff : IsLUB s a ↔ ∀ b, a ≤ b ↔ b ∈ upperBounds s := ⟨fun h _ => isLUB_le_iff h, fun H => ⟨(H _).1 le_rfl, fun b hb => (H b).2 hb⟩⟩ #align is_lub_iff_le_iff isLUB_iff_le_iff theorem isGLB_iff_le_iff : IsGLB s a ↔ ∀ b, b ≤ a ↔ b ∈ lowerBounds s := @isLUB_iff_le_iff αᵒᵈ _ _ _ #align is_glb_iff_le_iff isGLB_iff_le_iff theorem IsLUB.bddAbove (h : IsLUB s a) : BddAbove s := ⟨a, h.1⟩ #align is_lub.bdd_above IsLUB.bddAbove theorem IsGLB.bddBelow (h : IsGLB s a) : BddBelow s := ⟨a, h.1⟩ #align is_glb.bdd_below IsGLB.bddBelow theorem IsGreatest.bddAbove (h : IsGreatest s a) : BddAbove s := ⟨a, h.2⟩ #align is_greatest.bdd_above IsGreatest.bddAbove theorem IsLeast.bddBelow (h : IsLeast s a) : BddBelow s := ⟨a, h.2⟩ #align is_least.bdd_below IsLeast.bddBelow theorem IsLeast.nonempty (h : IsLeast s a) : s.Nonempty := ⟨a, h.1⟩ #align is_least.nonempty IsLeast.nonempty theorem IsGreatest.nonempty (h : IsGreatest s a) : s.Nonempty := ⟨a, h.1⟩ #align is_greatest.nonempty IsGreatest.nonempty @[simp] theorem upperBounds_union : upperBounds (s ∪ t) = upperBounds s ∩ upperBounds t := Subset.antisymm (fun _ hb => ⟨fun _ hx => hb (Or.inl hx), fun _ hx => hb (Or.inr hx)⟩) fun _ hb _ hx => hx.elim (fun hs => hb.1 hs) fun ht => hb.2 ht #align upper_bounds_union upperBounds_union @[simp] theorem lowerBounds_union : lowerBounds (s ∪ t) = lowerBounds s ∩ lowerBounds t := @upperBounds_union αᵒᵈ _ s t #align lower_bounds_union lowerBounds_union theorem union_upperBounds_subset_upperBounds_inter : upperBounds s ∪ upperBounds t ⊆ upperBounds (s ∩ t) := union_subset (upperBounds_mono_set inter_subset_left) (upperBounds_mono_set inter_subset_right) #align union_upper_bounds_subset_upper_bounds_inter union_upperBounds_subset_upperBounds_inter theorem union_lowerBounds_subset_lowerBounds_inter : lowerBounds s ∪ lowerBounds t ⊆ lowerBounds (s ∩ t) := @union_upperBounds_subset_upperBounds_inter αᵒᵈ _ s t #align union_lower_bounds_subset_lower_bounds_inter union_lowerBounds_subset_lowerBounds_inter theorem isLeast_union_iff {a : α} {s t : Set α} : IsLeast (s ∪ t) a ↔ IsLeast s a ∧ a ∈ lowerBounds t ∨ a ∈ lowerBounds s ∧ IsLeast t a := by simp [IsLeast, lowerBounds_union, or_and_right, and_comm (a := a ∈ t), and_assoc] #align is_least_union_iff isLeast_union_iff theorem isGreatest_union_iff : IsGreatest (s ∪ t) a ↔ IsGreatest s a ∧ a ∈ upperBounds t ∨ a ∈ upperBounds s ∧ IsGreatest t a := @isLeast_union_iff αᵒᵈ _ a s t #align is_greatest_union_iff isGreatest_union_iff theorem BddAbove.inter_of_left (h : BddAbove s) : BddAbove (s ∩ t) := h.mono inter_subset_left #align bdd_above.inter_of_left BddAbove.inter_of_left theorem BddAbove.inter_of_right (h : BddAbove t) : BddAbove (s ∩ t) := h.mono inter_subset_right #align bdd_above.inter_of_right BddAbove.inter_of_right theorem BddBelow.inter_of_left (h : BddBelow s) : BddBelow (s ∩ t) := h.mono inter_subset_left #align bdd_below.inter_of_left BddBelow.inter_of_left theorem BddBelow.inter_of_right (h : BddBelow t) : BddBelow (s ∩ t) := h.mono inter_subset_right #align bdd_below.inter_of_right BddBelow.inter_of_right theorem BddAbove.union [IsDirected α (· ≤ ·)] {s t : Set α} : BddAbove s → BddAbove t → BddAbove (s ∪ t) := by rintro ⟨a, ha⟩ ⟨b, hb⟩ obtain ⟨c, hca, hcb⟩ := exists_ge_ge a b rw [BddAbove, upperBounds_union] exact ⟨c, upperBounds_mono_mem hca ha, upperBounds_mono_mem hcb hb⟩ #align bdd_above.union BddAbove.union theorem bddAbove_union [IsDirected α (· ≤ ·)] {s t : Set α} : BddAbove (s ∪ t) ↔ BddAbove s ∧ BddAbove t := ⟨fun h => ⟨h.mono subset_union_left, h.mono subset_union_right⟩, fun h => h.1.union h.2⟩ #align bdd_above_union bddAbove_union theorem BddBelow.union [IsDirected α (· ≥ ·)] {s t : Set α} : BddBelow s → BddBelow t → BddBelow (s ∪ t) := @BddAbove.union αᵒᵈ _ _ _ _ #align bdd_below.union BddBelow.union theorem bddBelow_union [IsDirected α (· ≥ ·)] {s t : Set α} : BddBelow (s ∪ t) ↔ BddBelow s ∧ BddBelow t := @bddAbove_union αᵒᵈ _ _ _ _ #align bdd_below_union bddBelow_union theorem IsLUB.union [SemilatticeSup γ] {a b : γ} {s t : Set γ} (hs : IsLUB s a) (ht : IsLUB t b) : IsLUB (s ∪ t) (a ⊔ b) := ⟨fun _ h => h.casesOn (fun h => le_sup_of_le_left <\| hs.left h) fun h => le_sup_of_le_right <\| ht.left h, fun _ hc => sup_le (hs.right fun _ hd => hc <\| Or.inl hd) (ht.right fun _ hd => hc <\| Or.inr hd)⟩ #align is_lub.union IsLUB.union theorem IsGLB.union [SemilatticeInf γ] {a₁ a₂ : γ} {s t : Set γ} (hs : IsGLB s a₁) (ht : IsGLB t a₂) : IsGLB (s ∪ t) (a₁ ⊓ a₂) := hs.dual.union ht #align is_glb.union IsGLB.union theorem IsLeast.union [LinearOrder γ] {a b : γ} {s t : Set γ} (ha : IsLeast s a) (hb : IsLeast t b) : IsLeast (s ∪ t) (min a b) := ⟨by rcases le_total a b with h \| h <;> simp [h, ha.1, hb.1], (ha.isGLB.union hb.isGLB).1⟩ #align is_least.union IsLeast.union theorem IsGreatest.union [LinearOrder γ] {a b : γ} {s t : Set γ} (ha : IsGreatest s a) (hb : IsGreatest t b) : IsGreatest (s ∪ t) (max a b) := ⟨by rcases le_total a b with h \| h <;> simp [h, ha.1, hb.1], (ha.isLUB.union hb.isLUB).1⟩ #align is_greatest.union IsGreatest.union theorem IsLUB.inter_Ici_of_mem [LinearOrder γ] {s : Set γ} {a b : γ} (ha : IsLUB s a) (hb : b ∈ s) : IsLUB (s ∩ Ici b) a := ⟨fun _ hx => ha.1 hx.1, fun c hc => have hbc : b ≤ c := hc ⟨hb, le_rfl⟩ ha.2 fun x hx => ((le_total x b).elim fun hxb => hxb.trans hbc) fun hbx => hc ⟨hx, hbx⟩⟩ #align is_lub.inter_Ici_of_mem IsLUB.inter_Ici_of_mem theorem IsGLB.inter_Iic_of_mem [LinearOrder γ] {s : Set γ} {a b : γ} (ha : IsGLB s a) (hb : b ∈ s) : IsGLB (s ∩ Iic b) a := ha.dual.inter_Ici_of_mem hb #align is_glb.inter_Iic_of_mem IsGLB.inter_Iic_of_mem theorem bddAbove_iff_exists_ge [SemilatticeSup γ] {s : Set γ} (x₀ : γ) : BddAbove s ↔ ∃ x, x₀ ≤ x ∧ ∀ y ∈ s, y ≤ x := by rw [bddAbove_def, exists_ge_and_iff_exists] exact Monotone.ball fun x _ => monotone_le #align bdd_above_iff_exists_ge bddAbove_iff_exists_ge theorem bddBelow_iff_exists_le [SemilatticeInf γ] {s : Set γ} (x₀ : γ) : BddBelow s ↔ ∃ x, x ≤ x₀ ∧ ∀ y ∈ s, x ≤ y := bddAbove_iff_exists_ge (toDual x₀) #align bdd_below_iff_exists_le bddBelow_iff_exists_le theorem BddAbove.exists_ge [SemilatticeSup γ] {s : Set γ} (hs : BddAbove s) (x₀ : γ) : ∃ x, x₀ ≤ x ∧ ∀ y ∈ s, y ≤ x := (bddAbove_iff_exists_ge x₀).mp hs #align bdd_above.exists_ge BddAbove.exists_ge theorem BddBelow.exists_le [SemilatticeInf γ] {s : Set γ} (hs : BddBelow s) (x₀ : γ) : ∃ x, x ≤ x₀ ∧ ∀ y ∈ s, x ≤ y := (bddBelow_iff_exists_le x₀).mp hs #align bdd_below.exists_le BddBelow.exists_le theorem isLeast_Ici : IsLeast (Ici a) a := ⟨left_mem_Ici, fun _ => id⟩ #align is_least_Ici isLeast_Ici theorem isGreatest_Iic : IsGreatest (Iic a) a := ⟨right_mem_Iic, fun _ => id⟩ #align is_greatest_Iic isGreatest_Iic theorem isLUB_Iic : IsLUB (Iic a) a := isGreatest_Iic.isLUB #align is_lub_Iic isLUB_Iic theorem isGLB_Ici : IsGLB (Ici a) a := isLeast_Ici.isGLB #align is_glb_Ici isGLB_Ici theorem upperBounds_Iic : upperBounds (Iic a) = Ici a := isLUB_Iic.upperBounds_eq #align upper_bounds_Iic upperBounds_Iic theorem lowerBounds_Ici : lowerBounds (Ici a) = Iic a := isGLB_Ici.lowerBounds_eq #align lower_bounds_Ici lowerBounds_Ici theorem bddAbove_Iic : BddAbove (Iic a) := isLUB_Iic.bddAbove #align bdd_above_Iic bddAbove_Iic theorem bddBelow_Ici : BddBelow (Ici a) := isGLB_Ici.bddBelow #align bdd_below_Ici bddBelow_Ici theorem bddAbove_Iio : BddAbove (Iio a) := ⟨a, fun _ hx => le_of_lt hx⟩ #align bdd_above_Iio bddAbove_Iio theorem bddBelow_Ioi : BddBelow (Ioi a) := ⟨a, fun _ hx => le_of_lt hx⟩ #align bdd_below_Ioi bddBelow_Ioi theorem lub_Iio_le (a : α) (hb : IsLUB (Iio a) b) : b ≤ a := (isLUB_le_iff hb).mpr fun _ hk => le_of_lt hk #align lub_Iio_le lub_Iio_le theorem le_glb_Ioi (a : α) (hb : IsGLB (Ioi a) b) : a ≤ b := @lub_Iio_le αᵒᵈ _ _ a hb #align le_glb_Ioi le_glb_Ioi theorem lub_Iio_eq_self_or_Iio_eq_Iic [PartialOrder γ] {j : γ} (i : γ) (hj : IsLUB (Iio i) j) : j = i ∨ Iio i = Iic j := by cases' eq_or_lt_of_le (lub_Iio_le i hj) with hj_eq_i hj_lt_i · exact Or.inl hj_eq_i · right exact Set.ext fun k => ⟨fun hk_lt => hj.1 hk_lt, fun hk_le_j => lt_of_le_of_lt hk_le_j hj_lt_i⟩ #align lub_Iio_eq_self_or_Iio_eq_Iic lub_Iio_eq_self_or_Iio_eq_Iic theorem glb_Ioi_eq_self_or_Ioi_eq_Ici [PartialOrder γ] {j : γ} (i : γ) (hj : IsGLB (Ioi i) j) : j = i ∨ Ioi i = Ici j := @lub_Iio_eq_self_or_Iio_eq_Iic γᵒᵈ _ j i hj #align glb_Ioi_eq_self_or_Ioi_eq_Ici glb_Ioi_eq_self_or_Ioi_eq_Ici section variable [LinearOrder γ] theorem exists_lub_Iio (i : γ) : ∃ j, IsLUB (Iio i) j := by by_cases h_exists_lt : ∃ j, j ∈ upperBounds (Iio i) ∧ j < i · obtain ⟨j, hj_ub, hj_lt_i⟩ := h_exists_lt exact ⟨j, hj_ub, fun k hk_ub => hk_ub hj_lt_i⟩ · refine ⟨i, fun j hj => le_of_lt hj, ?_⟩ rw [mem_lowerBounds] by_contra h refine h_exists_lt ?_ push_neg at h exact h #align exists_lub_Iio exists_lub_Iio theorem exists_glb_Ioi (i : γ) : ∃ j, IsGLB (Ioi i) j := @exists_lub_Iio γᵒᵈ _ i #align exists_glb_Ioi exists_glb_Ioi variable [DenselyOrdered γ] theorem isLUB_Iio {a : γ} : IsLUB (Iio a) a := ⟨fun _ hx => le_of_lt hx, fun _ hy => le_of_forall_ge_of_dense hy⟩ #align is_lub_Iio isLUB_Iio theorem isGLB_Ioi {a : γ} : IsGLB (Ioi a) a := @isLUB_Iio γᵒᵈ _ _ a #align is_glb_Ioi isGLB_Ioi theorem upperBounds_Iio {a : γ} : upperBounds (Iio a) = Ici a := isLUB_Iio.upperBounds_eq #align upper_bounds_Iio upperBounds_Iio theorem lowerBounds_Ioi {a : γ} : lowerBounds (Ioi a) = Iic a := isGLB_Ioi.lowerBounds_eq #align lower_bounds_Ioi lowerBounds_Ioi end theorem isGreatest_singleton : IsGreatest {a} a := ⟨mem_singleton a, fun _ hx => le_of_eq <\| eq_of_mem_singleton hx⟩ #align is_greatest_singleton isGreatest_singleton theorem isLeast_singleton : IsLeast {a} a := @isGreatest_singleton αᵒᵈ _ a #align is_least_singleton isLeast_singleton theorem isLUB_singleton : IsLUB {a} a := isGreatest_singleton.isLUB #align is_lub_singleton isLUB_singleton theorem isGLB_singleton : IsGLB {a} a := isLeast_singleton.isGLB #align is_glb_singleton isGLB_singleton @[simp] lemma bddAbove_singleton : BddAbove ({a} : Set α) := isLUB_singleton.bddAbove #align bdd_above_singleton bddAbove_singleton @[simp] lemma bddBelow_singleton : BddBelow ({a} : Set α) := isGLB_singleton.bddBelow #align bdd_below_singleton bddBelow_singleton @[simp] theorem upperBounds_singleton : upperBounds {a} = Ici a := isLUB_singleton.upperBounds_eq #align upper_bounds_singleton upperBounds_singleton @[simp] theorem lowerBounds_singleton : lowerBounds {a} = Iic a := isGLB_singleton.lowerBounds_eq #align lower_bounds_singleton lowerBounds_singleton theorem bddAbove_Icc : BddAbove (Icc a b) := ⟨b, fun _ => And.right⟩ #align bdd_above_Icc bddAbove_Icc theorem bddBelow_Icc : BddBelow (Icc a b) := ⟨a, fun _ => And.left⟩ #align bdd_below_Icc bddBelow_Icc theorem bddAbove_Ico : BddAbove (Ico a b) := bddAbove_Icc.mono Ico_subset_Icc_self #align bdd_above_Ico bddAbove_Ico theorem bddBelow_Ico : BddBelow (Ico a b) := bddBelow_Icc.mono Ico_subset_Icc_self #align bdd_below_Ico bddBelow_Ico theorem bddAbove_Ioc : BddAbove (Ioc a b) := bddAbove_Icc.mono Ioc_subset_Icc_self #align bdd_above_Ioc bddAbove_Ioc theorem bddBelow_Ioc : BddBelow (Ioc a b) := bddBelow_Icc.mono Ioc_subset_Icc_self #align bdd_below_Ioc bddBelow_Ioc theorem bddAbove_Ioo : BddAbove (Ioo a b) := bddAbove_Icc.mono Ioo_subset_Icc_self #align bdd_above_Ioo bddAbove_Ioo theorem bddBelow_Ioo : BddBelow (Ioo a b) := bddBelow_Icc.mono Ioo_subset_Icc_self #align bdd_below_Ioo bddBelow_Ioo theorem isGreatest_Icc (h : a ≤ b) : IsGreatest (Icc a b) b := ⟨right_mem_Icc.2 h, fun _ => And.right⟩ #align is_greatest_Icc isGreatest_Icc theorem isLUB_Icc (h : a ≤ b) : IsLUB (Icc a b) b := (isGreatest_Icc h).isLUB #align is_lub_Icc isLUB_Icc theorem upperBounds_Icc (h : a ≤ b) : upperBounds (Icc a b) = Ici b := (isLUB_Icc h).upperBounds_eq #align upper_bounds_Icc upperBounds_Icc theorem isLeast_Icc (h : a ≤ b) : IsLeast (Icc a b) a := ⟨left_mem_Icc.2 h, fun _ => And.left⟩ #align is_least_Icc isLeast_Icc theorem isGLB_Icc (h : a ≤ b) : IsGLB (Icc a b) a := (isLeast_Icc h).isGLB #align is_glb_Icc isGLB_Icc theorem lowerBounds_Icc (h : a ≤ b) : lowerBounds (Icc a b) = Iic a := (isGLB_Icc h).lowerBounds_eq #align lower_bounds_Icc lowerBounds_Icc theorem isGreatest_Ioc (h : a < b) : IsGreatest (Ioc a b) b := ⟨right_mem_Ioc.2 h, fun _ => And.right⟩ #align is_greatest_Ioc isGreatest_Ioc theorem isLUB_Ioc (h : a < b) : IsLUB (Ioc a b) b := (isGreatest_Ioc h).isLUB #align is_lub_Ioc isLUB_Ioc theorem upperBounds_Ioc (h : a < b) : upperBounds (Ioc a b) = Ici b := (isLUB_Ioc h).upperBounds_eq #align upper_bounds_Ioc upperBounds_Ioc theorem isLeast_Ico (h : a < b) : IsLeast (Ico a b) a := ⟨left_mem_Ico.2 h, fun _ => And.left⟩ #align is_least_Ico isLeast_Ico theorem isGLB_Ico (h : a < b) : IsGLB (Ico a b) a := (isLeast_Ico h).isGLB #align is_glb_Ico isGLB_Ico theorem lowerBounds_Ico (h : a < b) : lowerBounds (Ico a b) = Iic a := (isGLB_Ico h).lowerBounds_eq #align lower_bounds_Ico lowerBounds_Ico section variable [SemilatticeSup γ] [DenselyOrdered γ] theorem isGLB_Ioo {a b : γ} (h : a < b) : IsGLB (Ioo a b) a := ⟨fun x hx => hx.1.le, fun x hx => by cases' eq_or_lt_of_le (le_sup_right : a ≤ x ⊔ a) with h₁ h₂ · exact h₁.symm ▸ le_sup_left obtain ⟨y, lty, ylt⟩ := exists_between h₂ apply (not_lt_of_le (sup_le (hx ⟨lty, ylt.trans_le (sup_le _ h.le)⟩) lty.le) ylt).elim obtain ⟨u, au, ub⟩ := exists_between h apply (hx ⟨au, ub⟩).trans ub.le⟩ #align is_glb_Ioo isGLB_Ioo theorem lowerBounds_Ioo {a b : γ} (hab : a < b) : lowerBounds (Ioo a b) = Iic a := (isGLB_Ioo hab).lowerBounds_eq #align lower_bounds_Ioo lowerBounds_Ioo theorem isGLB_Ioc {a b : γ} (hab : a < b) : IsGLB (Ioc a b) a := (isGLB_Ioo hab).of_subset_of_superset (isGLB_Icc hab.le) Ioo_subset_Ioc_self Ioc_subset_Icc_self #align is_glb_Ioc isGLB_Ioc theorem lowerBounds_Ioc {a b : γ} (hab : a < b) : lowerBounds (Ioc a b) = Iic a := (isGLB_Ioc hab).lowerBounds_eq #align lower_bound_Ioc lowerBounds_Ioc end section variable [SemilatticeInf γ] [DenselyOrdered γ] theorem isLUB_Ioo {a b : γ} (hab : a < b) : IsLUB (Ioo a b) b := by simpa only [dual_Ioo] using isGLB_Ioo hab.dual #align is_lub_Ioo isLUB_Ioo theorem upperBounds_Ioo {a b : γ} (hab : a < b) : upperBounds (Ioo a b) = Ici b := (isLUB_Ioo hab).upperBounds_eq #align upper_bounds_Ioo upperBounds_Ioo theorem isLUB_Ico {a b : γ} (hab : a < b) : IsLUB (Ico a b) b := by simpa only [dual_Ioc] using isGLB_Ioc hab.dual #align is_lub_Ico isLUB_Ico theorem upperBounds_Ico {a b : γ} (hab : a < b) : upperBounds (Ico a b) = Ici b := (isLUB_Ico hab).upperBounds_eq #align upper_bounds_Ico upperBounds_Ico end theorem bddBelow_iff_subset_Ici : BddBelow s ↔ ∃ a, s ⊆ Ici a := Iff.rfl #align bdd_below_iff_subset_Ici bddBelow_iff_subset_Ici theorem bddAbove_iff_subset_Iic : BddAbove s ↔ ∃ a, s ⊆ Iic a := Iff.rfl #align bdd_above_iff_subset_Iic bddAbove_iff_subset_Iic theorem bddBelow_bddAbove_iff_subset_Icc : BddBelow s ∧ BddAbove s ↔ ∃ a b, s ⊆ Icc a b := by simp [Ici_inter_Iic.symm, subset_inter_iff, bddBelow_iff_subset_Ici, bddAbove_iff_subset_Iic, exists_and_left, exists_and_right] #align bdd_below_bdd_above_iff_subset_Icc bddBelow_bddAbove_iff_subset_Icc @[simp] theorem isGreatest_univ_iff : IsGreatest univ a ↔ IsTop a := by simp [IsGreatest, mem_upperBounds, IsTop] #align is_greatest_univ_iff isGreatest_univ_iff theorem isGreatest_univ [OrderTop α] : IsGreatest (univ : Set α) ⊤ := isGreatest_univ_iff.2 isTop_top #align is_greatest_univ isGreatest_univ @[simp] theorem OrderTop.upperBounds_univ [PartialOrder γ] [OrderTop γ] : upperBounds (univ : Set γ) = {⊤} := by rw [isGreatest_univ.upperBounds_eq, Ici_top] #align order_top.upper_bounds_univ OrderTop.upperBounds_univ theorem isLUB_univ [OrderTop α] : IsLUB (univ : Set α) ⊤ := isGreatest_univ.isLUB #align is_lub_univ isLUB_univ @[simp] theorem OrderBot.lowerBounds_univ [PartialOrder γ] [OrderBot γ] : lowerBounds (univ : Set γ) = {⊥} := @OrderTop.upperBounds_univ γᵒᵈ _ _ #align order_bot.lower_bounds_univ OrderBot.lowerBounds_univ @[simp] theorem isLeast_univ_iff : IsLeast univ a ↔ IsBot a := @isGreatest_univ_iff αᵒᵈ _ _ #align is_least_univ_iff isLeast_univ_iff theorem isLeast_univ [OrderBot α] : IsLeast (univ : Set α) ⊥ := @isGreatest_univ αᵒᵈ _ _ #align is_least_univ isLeast_univ theorem isGLB_univ [OrderBot α] : IsGLB (univ : Set α) ⊥ := isLeast_univ.isGLB #align is_glb_univ isGLB_univ @[simp] theorem NoMaxOrder.upperBounds_univ [NoMaxOrder α] : upperBounds (univ : Set α) = ∅ := eq_empty_of_subset_empty fun b hb => let ⟨_, hx⟩ := exists_gt b not_le_of_lt hx (hb trivial) #align no_max_order.upper_bounds_univ NoMaxOrder.upperBounds_univ @[simp] theorem NoMinOrder.lowerBounds_univ [NoMinOrder α] : lowerBounds (univ : Set α) = ∅ := @NoMaxOrder.upperBounds_univ αᵒᵈ _ _ #align no_min_order.lower_bounds_univ NoMinOrder.lowerBounds_univ @[simp] theorem not_bddAbove_univ [NoMaxOrder α] : ¬BddAbove (univ : Set α) := by simp [BddAbove] #align not_bdd_above_univ not_bddAbove_univ @[simp] theorem not_bddBelow_univ [NoMinOrder α] : ¬BddBelow (univ : Set α) := @not_bddAbove_univ αᵒᵈ _ _ #align not_bdd_below_univ not_bddBelow_univ @[simp] theorem upperBounds_empty : upperBounds (∅ : Set α) = univ := by simp only [upperBounds, eq_univ_iff_forall, mem_setOf_eq, forall_mem_empty, forall_true_iff] #align upper_bounds_empty upperBounds_empty @[simp] theorem lowerBounds_empty : lowerBounds (∅ : Set α) = univ := @upperBounds_empty αᵒᵈ _ #align lower_bounds_empty lowerBounds_empty @[simp] theorem bddAbove_empty [Nonempty α] : BddAbove (∅ : Set α) := by simp only [BddAbove, upperBounds_empty, univ_nonempty] #align bdd_above_empty bddAbove_empty @[simp] theorem bddBelow_empty [Nonempty α] : BddBelow (∅ : Set α) := by simp only [BddBelow, lowerBounds_empty, univ_nonempty] #align bdd_below_empty bddBelow_empty @[simp] theorem isGLB_empty_iff : IsGLB ∅ a ↔ IsTop a := by simp [IsGLB] #align is_glb_empty_iff isGLB_empty_iff @[simp] theorem isLUB_empty_iff : IsLUB ∅ a ↔ IsBot a := @isGLB_empty_iff αᵒᵈ _ _ #align is_lub_empty_iff isLUB_empty_iff theorem isGLB_empty [OrderTop α] : IsGLB ∅ (⊤ : α) := isGLB_empty_iff.2 isTop_top #align is_glb_empty isGLB_empty theorem isLUB_empty [OrderBot α] : IsLUB ∅ (⊥ : α) := @isGLB_empty αᵒᵈ _ _ #align is_lub_empty isLUB_empty theorem IsLUB.nonempty [NoMinOrder α] (hs : IsLUB s a) : s.Nonempty := let ⟨a', ha'⟩ := exists_lt a nonempty_iff_ne_empty.2 fun h => not_le_of_lt ha' <\| hs.right <\| by rw [h, upperBounds_empty]; exact mem_univ _ #align is_lub.nonempty IsLUB.nonempty theorem IsGLB.nonempty [NoMaxOrder α] (hs : IsGLB s a) : s.Nonempty := hs.dual.nonempty #align is_glb.nonempty IsGLB.nonempty theorem nonempty_of_not_bddAbove [ha : Nonempty α] (h : ¬BddAbove s) : s.Nonempty := (Nonempty.elim ha) fun x => (not_bddAbove_iff'.1 h x).imp fun _ ha => ha.1 #align nonempty_of_not_bdd_above nonempty_of_not_bddAbove theorem nonempty_of_not_bddBelow [Nonempty α] (h : ¬BddBelow s) : s.Nonempty := @nonempty_of_not_bddAbove αᵒᵈ _ _ _ h #align nonempty_of_not_bdd_below nonempty_of_not_bddBelow @[simp]	Mathlib/Order/Bounds/Basic.lean	935	937	theorem bddAbove_insert [IsDirected α (· ≤ ·)] {s : Set α} {a : α} : BddAbove (insert a s) ↔ BddAbove s := by	simp only [insert_eq, bddAbove_union, bddAbove_singleton, true_and_iff]
import Mathlib.MeasureTheory.Measure.NullMeasurable import Mathlib.MeasureTheory.MeasurableSpace.Basic import Mathlib.Topology.Algebra.Order.LiminfLimsup #align_import measure_theory.measure.measure_space from "leanprover-community/mathlib"@"343e80208d29d2d15f8050b929aa50fe4ce71b55" noncomputable section open Set open Filter hiding map open Function MeasurableSpace open scoped Classical symmDiff open Topology Filter ENNReal NNReal Interval MeasureTheory 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⟩⟩ #align measure_theory.ae_is_measurably_generated MeasureTheory.ae_isMeasurablyGenerated 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] #align measure_theory.ae_uIoc_iff MeasureTheory.ae_uIoc_iff theorem measure_union (hd : Disjoint s₁ s₂) (h : MeasurableSet s₂) : μ (s₁ ∪ s₂) = μ s₁ + μ s₂ := measure_union₀ h.nullMeasurableSet hd.aedisjoint #align measure_theory.measure_union MeasureTheory.measure_union theorem measure_union' (hd : Disjoint s₁ s₂) (h : MeasurableSet s₁) : μ (s₁ ∪ s₂) = μ s₁ + μ s₂ := measure_union₀' h.nullMeasurableSet hd.aedisjoint #align measure_theory.measure_union' MeasureTheory.measure_union' 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 #align measure_theory.measure_inter_add_diff MeasureTheory.measure_inter_add_diff 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) #align measure_theory.measure_diff_add_inter MeasureTheory.measure_diff_add_inter 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 #align measure_theory.measure_union_add_inter MeasureTheory.measure_union_add_inter 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] #align measure_theory.measure_union_add_inter' MeasureTheory.measure_union_add_inter' lemma measure_symmDiff_eq (hs : MeasurableSet s) (ht : MeasurableSet t) : μ (s ∆ t) = μ (s \ t) + μ (t \ s) := by simpa only [symmDiff_def, sup_eq_union] using measure_union disjoint_sdiff_sdiff (ht.diff hs) 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_add_measure_compl (h : MeasurableSet s) : μ s + μ sᶜ = μ univ := measure_add_measure_compl₀ h.nullMeasurableSet #align measure_theory.measure_add_measure_compl MeasureTheory.measure_add_measure_compl 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 #align measure_theory.measure_bUnion₀ MeasureTheory.measure_biUnion₀ 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 #align measure_theory.measure_bUnion MeasureTheory.measure_biUnion 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] #align measure_theory.measure_sUnion₀ MeasureTheory.measure_sUnion₀ 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] #align measure_theory.measure_sUnion MeasureTheory.measure_sUnion 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 #align measure_theory.measure_bUnion_finset₀ MeasureTheory.measure_biUnion_finset₀ 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 #align measure_theory.measure_bUnion_finset MeasureTheory.measure_biUnion_finset 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 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)) #align measure_theory.tsum_meas_le_meas_Union_of_disjoint MeasureTheory.tsum_meas_le_meas_iUnion_of_disjoint 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] #align measure_theory.tsum_measure_preimage_singleton MeasureTheory.tsum_measure_preimage_singleton 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] 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] #align measure_theory.sum_measure_preimage_singleton MeasureTheory.sum_measure_preimage_singleton theorem measure_diff_null' (h : μ (s₁ ∩ s₂) = 0) : μ (s₁ \ s₂) = μ s₁ := measure_congr <\| diff_ae_eq_self.2 h #align measure_theory.measure_diff_null' MeasureTheory.measure_diff_null' theorem measure_add_diff (hs : MeasurableSet s) (t : Set α) : μ s + μ (t \ s) = μ (s ∪ t) := by rw [← measure_union' disjoint_sdiff_right hs, union_diff_self] #align measure_theory.measure_add_diff MeasureTheory.measure_add_diff theorem measure_diff' (s : Set α) (hm : MeasurableSet t) (h_fin : μ t ≠ ∞) : μ (s \ t) = μ (s ∪ t) - μ t := Eq.symm <\| ENNReal.sub_eq_of_add_eq h_fin <\| by rw [add_comm, measure_add_diff hm, union_comm] #align measure_theory.measure_diff' MeasureTheory.measure_diff' theorem measure_diff (h : s₂ ⊆ s₁) (h₂ : MeasurableSet s₂) (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] #align measure_theory.measure_diff MeasureTheory.measure_diff 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 #align measure_theory.le_measure_diff MeasureTheory.le_measure_diff 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 := (WithTop.sub_eq_top_iff.2 ⟨hμu, hμv⟩).symm _ ≤ μ (u \ v) := le_measure_diff _ ≤ μ (u \ v ∪ v \ u) := measure_mono subset_union_left 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 : MeasurableSet s) (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 #align measure_theory.measure_diff_lt_of_lt_add MeasureTheory.measure_diff_lt_of_lt_add theorem measure_diff_le_iff_le_add (hs : MeasurableSet s) (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] #align measure_theory.measure_diff_le_iff_le_add MeasureTheory.measure_diff_le_iff_le_add 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) #align measure_theory.measure_eq_measure_of_null_diff MeasureTheory.measure_eq_measure_of_null_diff 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)⟩ #align measure_theory.measure_eq_measure_of_between_null_diff MeasureTheory.measure_eq_measure_of_between_null_diff 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 #align measure_theory.measure_eq_measure_smaller_of_between_null_diff MeasureTheory.measure_eq_measure_smaller_of_between_null_diff 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 #align measure_theory.measure_eq_measure_larger_of_between_null_diff MeasureTheory.measure_eq_measure_larger_of_between_null_diff 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 #align measure_theory.measure_compl MeasureTheory.measure_compl 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⟩⟩ #align measure_theory.union_ae_eq_left_iff_ae_subset MeasureTheory.union_ae_eq_left_iff_ae_subset @[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] #align measure_theory.union_ae_eq_right_iff_ae_subset MeasureTheory.union_ae_eq_right_iff_ae_subset theorem ae_eq_of_ae_subset_of_measure_ge (h₁ : s ≤ᵐ[μ] t) (h₂ : μ t ≤ μ s) (hsm : MeasurableSet s) (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] #align measure_theory.ae_eq_of_ae_subset_of_measure_ge MeasureTheory.ae_eq_of_ae_subset_of_measure_ge theorem ae_eq_of_subset_of_measure_ge (h₁ : s ⊆ t) (h₂ : μ t ≤ μ s) (hsm : MeasurableSet s) (ht : μ t ≠ ∞) : s =ᵐ[μ] t := ae_eq_of_ae_subset_of_measure_ge (HasSubset.Subset.eventuallyLE h₁) h₂ hsm ht #align measure_theory.ae_eq_of_subset_of_measure_ge MeasureTheory.ae_eq_of_subset_of_measure_ge theorem measure_iUnion_congr_of_subset [Countable β] {s : β → Set α} {t : β → Set α} (hsub : ∀ b, s b ⊆ t b) (h_le : ∀ b, μ (t b) ≤ μ (s b)) : μ (⋃ b, s b) = μ (⋃ b, t b) := by rcases Classical.em (∃ b, μ (t b) = ∞) with (⟨b, hb⟩ \| htop) · calc μ (⋃ b, s b) = ∞ := top_unique (hb ▸ (h_le b).trans <\| measure_mono <\| subset_iUnion _ _) _ = μ (⋃ b, t b) := Eq.symm <\| top_unique <\| hb ▸ measure_mono (subset_iUnion _ _) push_neg at htop refine le_antisymm (measure_mono (iUnion_mono hsub)) ?_ 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 _ _) · exact (measurableSet_toMeasurable _ _).inter (measurableSet_toMeasurable _ _) · 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 _ #align measure_theory.measure_Union_congr_of_subset MeasureTheory.measure_iUnion_congr_of_subset 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⟩) #align measure_theory.measure_union_congr_of_subset MeasureTheory.measure_union_congr_of_subset @[simp] theorem measure_iUnion_toMeasurable [Countable β] (s : β → Set α) : μ (⋃ b, toMeasurable μ (s b)) = μ (⋃ b, s b) := Eq.symm <\| measure_iUnion_congr_of_subset (fun _b => subset_toMeasurable _ _) fun _b => (measure_toMeasurable _).le #align measure_theory.measure_Union_to_measurable MeasureTheory.measure_iUnion_toMeasurable 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] #align measure_theory.measure_bUnion_to_measurable MeasureTheory.measure_biUnion_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 #align measure_theory.measure_to_measurable_union MeasureTheory.measure_toMeasurable_union @[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 #align measure_theory.measure_union_to_measurable MeasureTheory.measure_union_toMeasurable theorem sum_measure_le_measure_univ {s : Finset ι} {t : ι → Set α} (h : ∀ i ∈ s, MeasurableSet (t i)) (H : Set.PairwiseDisjoint (↑s) t) : (∑ i ∈ s, μ (t i)) ≤ μ (univ : Set α) := by rw [← measure_biUnion_finset H h] exact measure_mono (subset_univ _) #align measure_theory.sum_measure_le_measure_univ MeasureTheory.sum_measure_le_measure_univ theorem tsum_measure_le_measure_univ {s : ι → Set α} (hs : ∀ i, MeasurableSet (s i)) (H : Pairwise (Disjoint 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 #align measure_theory.tsum_measure_le_measure_univ MeasureTheory.tsum_measure_le_measure_univ theorem exists_nonempty_inter_of_measure_univ_lt_tsum_measure {m : MeasurableSpace α} (μ : Measure α) {s : ι → Set α} (hs : ∀ i, MeasurableSet (s i)) (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) #align measure_theory.exists_nonempty_inter_of_measure_univ_lt_tsum_measure MeasureTheory.exists_nonempty_inter_of_measure_univ_lt_tsum_measure 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, MeasurableSet (t i)) (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) #align measure_theory.exists_nonempty_inter_of_measure_univ_lt_sum_measure MeasureTheory.exists_nonempty_inter_of_measure_univ_lt_sum_measure 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) #align measure_theory.nonempty_inter_of_measure_lt_add MeasureTheory.nonempty_inter_of_measure_lt_add 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 #align measure_theory.nonempty_inter_of_measure_lt_add' MeasureTheory.nonempty_inter_of_measure_lt_add' theorem measure_iUnion_eq_iSup [Countable ι] {s : ι → Set α} (hd : Directed (· ⊆ ·) s) : μ (⋃ i, s i) = ⨆ i, μ (s i) := by cases nonempty_encodable ι -- WLOG, `ι = ℕ` generalize ht : Function.extend Encodable.encode s ⊥ = t replace hd : Directed (· ⊆ ·) t := ht ▸ hd.extend_bot Encodable.encode_injective suffices μ (⋃ n, t n) = ⨆ n, μ (t n) by simp only [← ht, Function.apply_extend μ, ← iSup_eq_iUnion, iSup_extend_bot Encodable.encode_injective, (· ∘ ·), Pi.bot_apply, bot_eq_empty, measure_empty] at this exact this.trans (iSup_extend_bot Encodable.encode_injective _) 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) := MeasurableSet.disjointed fun n => measurableSet_toMeasurable _ _ calc μ (⋃ n, t n) ≤ μ (⋃ n, T n) := measure_mono (iUnion_mono fun i => subset_toMeasurable _ _) _ = μ (⋃ n, Td n) := by rw [iUnion_disjointed] _ ≤ ∑' 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 #align measure_theory.measure_Union_eq_supr MeasureTheory.measure_iUnion_eq_iSup theorem measure_iUnion_eq_iSup' {α ι : Type} [MeasurableSpace α] {μ : Measure α} [Countable ι] [Preorder ι] [IsDirected ι (· ≤ ·)] {f : ι → Set α} : μ (⋃ i, f i) = ⨆ i, μ (Accumulate f i) := by have hd : Directed (· ⊆ ·) (Accumulate f) := by intro i j rcases directed_of (· ≤ ·) i j with ⟨k, rik, rjk⟩ exact ⟨k, biUnion_subset_biUnion_left fun l rli ↦ le_trans rli rik, biUnion_subset_biUnion_left fun l rlj ↦ le_trans rlj rjk⟩ rw [← iUnion_accumulate] exact measure_iUnion_eq_iSup hd 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.toEncodable rw [biUnion_eq_iUnion, measure_iUnion_eq_iSup hd.directed_val, ← iSup_subtype''] #align measure_theory.measure_bUnion_eq_supr MeasureTheory.measure_biUnion_eq_iSup theorem measure_iInter_eq_iInf [Countable ι] {s : ι → Set α} (h : ∀ i, MeasurableSet (s i)) (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 _ k), ENNReal.sub_iInf, ← ENNReal.sub_sub_cancel hk (measure_mono (iInter_subset _ k)), ← measure_diff (iInter_subset _ k) (MeasurableSet.iInter h) (this _ (iInter_subset _ k)), diff_iInter, measure_iUnion_eq_iSup] · congr 1 refine le_antisymm (iSup_mono' fun i => ?_) (iSup_mono fun i => ?_) · rcases hd i k with ⟨j, hji, hjk⟩ use j rw [← measure_diff hjk (h _) (this _ hjk)] gcongr · rw [tsub_le_iff_right, ← measure_union, Set.union_comm] · exact measure_mono (diff_subset_iff.1 Subset.rfl) · apply disjoint_sdiff_left · apply h i · exact hd.mono_comp _ fun _ _ => diff_subset_diff_right #align measure_theory.measure_Inter_eq_infi MeasureTheory.measure_iInter_eq_iInf theorem measure_iInter_eq_iInf' {α ι : Type} [MeasurableSpace α] {μ : Measure α} [Countable ι] [Preorder ι] [IsDirected ι (· ≤ ·)] {f : ι → Set α} (h : ∀ i, MeasurableSet (f i)) (hfin : ∃ i, μ (f i) ≠ ∞) : μ (⋂ i, f i) = ⨅ i, μ (⋂ j ≤ i, f j) := by let s := fun i ↦ ⋂ j ≤ i, f j have iInter_eq : ⋂ i, f i = ⋂ i, s i := by ext x; simp [s]; constructor · exact fun h _ j _ ↦ h j · intro h i rcases directed_of (· ≤ ·) i i with ⟨j, rij, -⟩ exact h j i rij have ms : ∀ i, MeasurableSet (s i) := fun i ↦ MeasurableSet.biInter (countable_univ.mono <\| subset_univ _) fun i _ ↦ h i have hd : Directed (· ⊇ ·) s := by intro i j rcases directed_of (· ≤ ·) i j with ⟨k, rik, rjk⟩ exact ⟨k, biInter_subset_biInter_left fun j rji ↦ le_trans rji rik, biInter_subset_biInter_left fun i rij ↦ le_trans rij rjk⟩ have hfin' : ∃ i, μ (s i) ≠ ∞ := by rcases hfin with ⟨i, hi⟩ rcases directed_of (· ≤ ·) i i with ⟨j, rij, -⟩ exact ⟨j, ne_top_of_le_ne_top hi <\| measure_mono <\| biInter_subset_of_mem rij⟩ exact iInter_eq ▸ measure_iInter_eq_iInf ms hd hfin' theorem tendsto_measure_iUnion [Preorder ι] [IsDirected ι (· ≤ ·)] [Countable ι] {s : ι → Set α} (hm : Monotone s) : Tendsto (μ ∘ s) atTop (𝓝 (μ (⋃ n, s n))) := by rw [measure_iUnion_eq_iSup hm.directed_le] exact tendsto_atTop_iSup fun n m hnm => measure_mono <\| hm hnm #align measure_theory.tendsto_measure_Union MeasureTheory.tendsto_measure_iUnion theorem tendsto_measure_iUnion' {α ι : Type} [MeasurableSpace α] {μ : Measure α} [Countable ι] [Preorder ι] [IsDirected ι (· ≤ ·)] {f : ι → Set α} : Tendsto (fun i ↦ μ (Accumulate f i)) atTop (𝓝 (μ (⋃ i, f i))) := by rw [measure_iUnion_eq_iSup'] exact tendsto_atTop_iSup fun i j hij ↦ by gcongr theorem tendsto_measure_iInter [Countable ι] [Preorder ι] [IsDirected ι (· ≤ ·)] {s : ι → Set α} (hs : ∀ n, MeasurableSet (s n)) (hm : Antitone s) (hf : ∃ i, μ (s i) ≠ ∞) : Tendsto (μ ∘ s) atTop (𝓝 (μ (⋂ n, s n))) := by rw [measure_iInter_eq_iInf hs hm.directed_ge hf] exact tendsto_atTop_iInf fun n m hnm => measure_mono <\| hm hnm #align measure_theory.tendsto_measure_Inter MeasureTheory.tendsto_measure_iInter theorem tendsto_measure_iInter' {α ι : Type} [MeasurableSpace α] {μ : Measure α} [Countable ι] [Preorder ι] [IsDirected ι (· ≤ ·)] {f : ι → Set α} (hm : ∀ i, MeasurableSet (f i)) (hf : ∃ i, μ (f i) ≠ ∞) : Tendsto (fun i ↦ μ (⋂ j ∈ {j \| j ≤ i}, f j)) atTop (𝓝 (μ (⋂ i, f i))) := by rw [measure_iInter_eq_iInf' hm hf] exact tendsto_atTop_iInf fun i j hij ↦ measure_mono <\| biInter_subset_biInter_left fun k hki ↦ le_trans hki hij 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, MeasurableSet (s r)) (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 refine tendsto_order.2 ⟨fun l hl => ?_, fun L hL => ?_⟩ · filter_upwards [self_mem_nhdsWithin (s := Ioi a)] with r hr using hl.trans_le (measure_mono (biInter_subset_of_mem hr)) obtain ⟨u, u_anti, u_pos, u_lim⟩ : ∃ u : ℕ → ι, StrictAnti u ∧ (∀ n : ℕ, a < u n) ∧ Tendsto u atTop (𝓝 a) := by rcases hf with ⟨r, ar, _⟩ rcases exists_seq_strictAnti_tendsto' ar with ⟨w, w_anti, w_mem, w_lim⟩ exact ⟨w, w_anti, fun n => (w_mem n).1, w_lim⟩ have A : Tendsto (μ ∘ s ∘ u) atTop (𝓝 (μ (⋂ n, s (u n)))) := by refine tendsto_measure_iInter (fun n => hs _ (u_pos n)) ?_ ?_ · intro m n hmn exact hm _ _ (u_pos n) (u_anti.antitone hmn) · rcases hf with ⟨r, rpos, hr⟩ obtain ⟨n, hn⟩ : ∃ n : ℕ, u n < r := ((tendsto_order.1 u_lim).2 r rpos).exists refine ⟨n, ne_of_lt (lt_of_le_of_lt ?_ hr.lt_top)⟩ exact measure_mono (hm _ _ (u_pos n) hn.le) have B : ⋂ n, s (u n) = ⋂ r > a, s r := by apply Subset.antisymm · simp only [subset_iInter_iff, gt_iff_lt] intro r rpos obtain ⟨n, hn⟩ : ∃ n, u n < r := ((tendsto_order.1 u_lim).2 _ rpos).exists exact Subset.trans (iInter_subset _ n) (hm (u n) r (u_pos n) hn.le) · simp only [subset_iInter_iff, gt_iff_lt] intro n apply biInter_subset_of_mem exact u_pos n rw [B] at A obtain ⟨n, hn⟩ : ∃ n, μ (s (u n)) < L := ((tendsto_order.1 A).2 _ hL).exists have : Ioc a (u n) ∈ 𝓝[>] a := Ioc_mem_nhdsWithin_Ioi ⟨le_rfl, u_pos n⟩ filter_upwards [this] with r hr using lt_of_le_of_lt (measure_mono (hm _ _ hr.1 hr.2)) hn #align measure_theory.tendsto_measure_bInter_gt MeasureTheory.tendsto_measure_biInter_gt theorem measure_limsup_eq_zero {s : ℕ → Set α} (hs : (∑' i, μ (s i)) ≠ ∞) : μ (limsup s atTop) = 0 := by -- First we replace the sequence `sₙ` with a sequence of measurable sets `tₙ ⊇ sₙ` of the same -- measure. set t : ℕ → Set α := fun n => toMeasurable μ (s n) have ht : (∑' i, μ (t i)) ≠ ∞ := by simpa only [t, measure_toMeasurable] using hs suffices μ (limsup t atTop) = 0 by have A : s ≤ t := fun n => subset_toMeasurable μ (s n) -- TODO default args fail exact measure_mono_null (limsup_le_limsup (eventually_of_forall (Pi.le_def.mp A))) this -- Next we unfold `limsup` for sets and replace equality with an inequality simp only [limsup_eq_iInf_iSup_of_nat', Set.iInf_eq_iInter, Set.iSup_eq_iUnion, ← nonpos_iff_eq_zero] -- Finally, we estimate `μ (⋃ i, t (i + n))` by `∑ i', μ (t (i + n))` refine le_of_tendsto_of_tendsto' (tendsto_measure_iInter (fun i => MeasurableSet.iUnion fun b => measurableSet_toMeasurable _ _) ?_ ⟨0, ne_top_of_le_ne_top ht (measure_iUnion_le t)⟩) (ENNReal.tendsto_sum_nat_add (μ ∘ t) ht) fun n => measure_iUnion_le _ intro n m hnm x simp only [Set.mem_iUnion] exact fun ⟨i, hi⟩ => ⟨i + (m - n), by simpa only [add_assoc, tsub_add_cancel_of_le hnm] using hi⟩ #align measure_theory.measure_limsup_eq_zero MeasureTheory.measure_limsup_eq_zero theorem measure_liminf_eq_zero {s : ℕ → Set α} (h : (∑' i, μ (s i)) ≠ ∞) : μ (liminf s atTop) = 0 := by rw [← le_zero_iff] have : liminf s atTop ≤ limsup s atTop := liminf_le_limsup exact (μ.mono this).trans (by simp [measure_limsup_eq_zero h]) #align measure_theory.measure_liminf_eq_zero MeasureTheory.measure_liminf_eq_zero -- Need to specify `α := Set α` below because of diamond; see #19041 theorem limsup_ae_eq_of_forall_ae_eq (s : ℕ → Set α) {t : Set α} (h : ∀ n, s n =ᵐ[μ] t) : limsup (α := Set α) s atTop =ᵐ[μ] t := by simp_rw [ae_eq_set] at h ⊢ constructor · rw [atTop.limsup_sdiff s t] apply measure_limsup_eq_zero simp [h] · rw [atTop.sdiff_limsup s t] apply measure_liminf_eq_zero simp [h] #align measure_theory.limsup_ae_eq_of_forall_ae_eq MeasureTheory.limsup_ae_eq_of_forall_ae_eq -- Need to specify `α := Set α` above because of diamond; see #19041 theorem liminf_ae_eq_of_forall_ae_eq (s : ℕ → Set α) {t : Set α} (h : ∀ n, s n =ᵐ[μ] t) : liminf (α := Set α) s atTop =ᵐ[μ] t := by simp_rw [ae_eq_set] at h ⊢ constructor · rw [atTop.liminf_sdiff s t] apply measure_liminf_eq_zero simp [h] · rw [atTop.sdiff_liminf s t] apply measure_limsup_eq_zero simp [h] #align measure_theory.liminf_ae_eq_of_forall_ae_eq MeasureTheory.liminf_ae_eq_of_forall_ae_eq theorem measure_if {x : β} {t : Set β} {s : Set α} : μ (if x ∈ t then s else ∅) = indicator t (fun _ => μ s) x := by split_ifs with h <;> simp [h] #align measure_theory.measure_if MeasureTheory.measure_if end section variable {m0 : MeasurableSpace α} [MeasurableSpace β] [MeasurableSpace γ] variable {μ μ₁ μ₂ μ₃ ν ν' ν₁ ν₂ : Measure α} {s s' t : Set α} namespace Measure 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 #align measure_theory.measure.measure_inter_eq_of_measure_eq MeasureTheory.Measure.measure_inter_eq_of_measure_eq 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 #align measure_theory.measure.measure_to_measurable_inter MeasureTheory.Measure.measure_toMeasurable_inter instance instZero [MeasurableSpace α] : Zero (Measure α) := ⟨{ toOuterMeasure := 0 m_iUnion := fun _f _hf _hd => tsum_zero.symm trim_le := OuterMeasure.trim_zero.le }⟩ #align measure_theory.measure.has_zero MeasureTheory.Measure.instZero @[simp] theorem zero_toOuterMeasure {_m : MeasurableSpace α} : (0 : Measure α).toOuterMeasure = 0 := rfl #align measure_theory.measure.zero_to_outer_measure MeasureTheory.Measure.zero_toOuterMeasure @[simp, norm_cast] theorem coe_zero {_m : MeasurableSpace α} : ⇑(0 : Measure α) = 0 := rfl #align measure_theory.measure.coe_zero MeasureTheory.Measure.coe_zero @[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]⟩ #align measure_theory.measure.subsingleton MeasureTheory.Measure.instSubsingleton theorem eq_zero_of_isEmpty [IsEmpty α] {_m : MeasurableSpace α} (μ : Measure α) : μ = 0 := Subsingleton.elim μ 0 #align measure_theory.measure.eq_zero_of_is_empty MeasureTheory.Measure.eq_zero_of_isEmpty instance instInhabited [MeasurableSpace α] : Inhabited (Measure α) := ⟨0⟩ #align measure_theory.measure.inhabited MeasureTheory.Measure.instInhabited 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] }⟩ #align measure_theory.measure.has_add MeasureTheory.Measure.instAdd @[simp] theorem add_toOuterMeasure {_m : MeasurableSpace α} (μ₁ μ₂ : Measure α) : (μ₁ + μ₂).toOuterMeasure = μ₁.toOuterMeasure + μ₂.toOuterMeasure := rfl #align measure_theory.measure.add_to_outer_measure MeasureTheory.Measure.add_toOuterMeasure @[simp, norm_cast] theorem coe_add {_m : MeasurableSpace α} (μ₁ μ₂ : Measure α) : ⇑(μ₁ + μ₂) = μ₁ + μ₂ := rfl #align measure_theory.measure.coe_add MeasureTheory.Measure.coe_add theorem add_apply {_m : MeasurableSpace α} (μ₁ μ₂ : Measure α) (s : Set α) : (μ₁ + μ₂) s = μ₁ s + μ₂ s := rfl #align measure_theory.measure.add_apply MeasureTheory.Measure.add_apply 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 #align measure_theory.measure.mul_action MeasureTheory.Measure.instMulAction instance instAddCommMonoid [MeasurableSpace α] : AddCommMonoid (Measure α) := toOuterMeasure_injective.addCommMonoid toOuterMeasure zero_toOuterMeasure add_toOuterMeasure fun _ _ => smul_toOuterMeasure _ _ #align measure_theory.measure.add_comm_monoid MeasureTheory.Measure.instAddCommMonoid def coeAddHom {_ : MeasurableSpace α} : Measure α →+ Set α → ℝ≥0∞ where toFun := (⇑) map_zero' := coe_zero map_add' := coe_add #align measure_theory.measure.coe_add_hom MeasureTheory.Measure.coeAddHom @[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 #align measure_theory.measure.coe_finset_sum MeasureTheory.Measure.coe_finset_sum 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] #align measure_theory.measure.finset_sum_apply MeasureTheory.Measure.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 #align measure_theory.measure.distrib_mul_action MeasureTheory.Measure.instDistribMulAction 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 #align measure_theory.measure.module MeasureTheory.Measure.instModule @[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 #align measure_theory.measure.coe_nnreal_smul_apply MeasureTheory.Measure.coe_nnreal_smul_apply @[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_iff {p : α → Prop} {c : ℝ≥0∞} (hc : c ≠ 0) : (∀ᵐ x ∂c • μ, p x) ↔ ∀ᵐ x ∂μ, p x := by simp only [ae_iff, Algebra.id.smul_eq_mul, smul_apply, or_iff_right_iff_imp, mul_eq_zero] simp only [IsEmpty.forall_iff, hc] #align measure_theory.measure.ae_smul_measure_iff MeasureTheory.Measure.ae_smul_measure_iff 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) #align measure_theory.measure.measure_eq_left_of_subset_of_measure_add_eq MeasureTheory.Measure.measure_eq_left_of_subset_of_measure_add_eq 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'' #align measure_theory.measure.measure_eq_right_of_subset_of_measure_add_eq MeasureTheory.Measure.measure_eq_right_of_subset_of_measure_add_eq 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 #align measure_theory.measure.measure_to_measurable_add_inter_left MeasureTheory.Measure.measure_toMeasurable_add_inter_left 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 #align measure_theory.measure.measure_to_measurable_add_inter_right MeasureTheory.Measure.measure_toMeasurable_add_inter_right instance instPartialOrder [MeasurableSpace α] : PartialOrder (Measure α) where le m₁ m₂ := ∀ s, m₁ s ≤ m₂ s le_refl m s := le_rfl le_trans m₁ m₂ m₃ h₁ h₂ s := le_trans (h₁ s) (h₂ s) le_antisymm m₁ m₂ h₁ h₂ := ext fun s _ => le_antisymm (h₁ s) (h₂ s) #align measure_theory.measure.partial_order MeasureTheory.Measure.instPartialOrder theorem toOuterMeasure_le : μ₁.toOuterMeasure ≤ μ₂.toOuterMeasure ↔ μ₁ ≤ μ₂ := .rfl #align measure_theory.measure.to_outer_measure_le MeasureTheory.Measure.toOuterMeasure_le theorem le_iff : μ₁ ≤ μ₂ ↔ ∀ s, MeasurableSet s → μ₁ s ≤ μ₂ s := outerMeasure_le_iff #align measure_theory.measure.le_iff MeasureTheory.Measure.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 #align measure_theory.measure.le_iff' MeasureTheory.Measure.le_iff' 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] #align measure_theory.measure.lt_iff MeasureTheory.Measure.lt_iff 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] #align measure_theory.measure.lt_iff' MeasureTheory.Measure.lt_iff' instance covariantAddLE [MeasurableSpace α] : CovariantClass (Measure α) (Measure α) (· + ·) (· ≤ ·) := ⟨fun _ν _μ₁ _μ₂ hμ s => add_le_add_left (hμ s) _⟩ #align measure_theory.measure.covariant_add_le MeasureTheory.Measure.covariantAddLE protected theorem le_add_left (h : μ ≤ ν) : μ ≤ ν' + ν := fun s => le_add_left (h s) #align measure_theory.measure.le_add_left MeasureTheory.Measure.le_add_left protected theorem le_add_right (h : μ ≤ ν) : μ ≤ ν + ν' := fun s => le_add_right (h s) #align measure_theory.measure.le_add_right MeasureTheory.Measure.le_add_right @[simp] theorem _root_.MeasureTheory.OuterMeasure.toMeasure_top : (⊤ : OuterMeasure α).toMeasure (by rw [OuterMeasure.top_caratheodory]; exact le_top) = (⊤ : Measure α) := toOuterMeasure_toMeasure (μ := ⊤) #align measure_theory.outer_measure.to_measure_top MeasureTheory.OuterMeasure.toMeasure_top @[simp] theorem toOuterMeasure_top [MeasurableSpace α] : (⊤ : Measure α).toOuterMeasure = (⊤ : OuterMeasure α) := rfl #align measure_theory.measure.to_outer_measure_top MeasureTheory.Measure.toOuterMeasure_top @[simp] theorem top_add : ⊤ + μ = ⊤ := top_unique <\| Measure.le_add_right le_rfl #align measure_theory.measure.top_add MeasureTheory.Measure.top_add @[simp] theorem add_top : μ + ⊤ = ⊤ := top_unique <\| Measure.le_add_left le_rfl #align measure_theory.measure.add_top MeasureTheory.Measure.add_top protected theorem zero_le {_m0 : MeasurableSpace α} (μ : Measure α) : 0 ≤ μ := bot_le #align measure_theory.measure.zero_le MeasureTheory.Measure.zero_le theorem nonpos_iff_eq_zero' : μ ≤ 0 ↔ μ = 0 := μ.zero_le.le_iff_eq #align measure_theory.measure.nonpos_iff_eq_zero' MeasureTheory.Measure.nonpos_iff_eq_zero' @[simp] theorem measure_univ_eq_zero : μ univ = 0 ↔ μ = 0 := ⟨fun h => bot_unique fun s => (h ▸ measure_mono (subset_univ s) : μ s ≤ 0), fun h => h.symm ▸ rfl⟩ #align measure_theory.measure.measure_univ_eq_zero MeasureTheory.Measure.measure_univ_eq_zero theorem measure_univ_ne_zero : μ univ ≠ 0 ↔ μ ≠ 0 := measure_univ_eq_zero.not #align measure_theory.measure.measure_univ_ne_zero MeasureTheory.Measure.measure_univ_ne_zero instance [NeZero μ] : NeZero (μ univ) := ⟨measure_univ_ne_zero.2 <\| NeZero.ne μ⟩ @[simp] theorem measure_univ_pos : 0 < μ univ ↔ μ ≠ 0 := pos_iff_ne_zero.trans measure_univ_ne_zero #align measure_theory.measure.measure_univ_pos MeasureTheory.Measure.measure_univ_pos def liftLinear {m0 : MeasurableSpace α} (f : OuterMeasure α →ₗ[ℝ≥0∞] OuterMeasure β) (hf : ∀ μ : Measure α, ‹_› ≤ (f μ.toOuterMeasure).caratheodory) : Measure α →ₗ[ℝ≥0∞] Measure β where toFun μ := (f μ.toOuterMeasure).toMeasure (hf μ) map_add' μ₁ μ₂ := ext fun s hs => by simp only [map_add, coe_add, Pi.add_apply, toMeasure_apply, add_toOuterMeasure, OuterMeasure.coe_add, hs] map_smul' c μ := ext fun s hs => by simp only [LinearMap.map_smulₛₗ, coe_smul, Pi.smul_apply, toMeasure_apply, smul_toOuterMeasure (R := ℝ≥0∞), OuterMeasure.coe_smul (R := ℝ≥0∞), smul_apply, hs] #align measure_theory.measure.lift_linear MeasureTheory.Measure.liftLinear lemma liftLinear_apply₀ {f : OuterMeasure α →ₗ[ℝ≥0∞] OuterMeasure β} (hf) {s : Set β} (hs : NullMeasurableSet s (liftLinear f hf μ)) : liftLinear f hf μ s = f μ.toOuterMeasure s := toMeasure_apply₀ _ (hf μ) hs @[simp] theorem liftLinear_apply {f : OuterMeasure α →ₗ[ℝ≥0∞] OuterMeasure β} (hf) {s : Set β} (hs : MeasurableSet s) : liftLinear f hf μ s = f μ.toOuterMeasure s := toMeasure_apply _ (hf μ) hs #align measure_theory.measure.lift_linear_apply MeasureTheory.Measure.liftLinear_apply theorem le_liftLinear_apply {f : OuterMeasure α →ₗ[ℝ≥0∞] OuterMeasure β} (hf) (s : Set β) : f μ.toOuterMeasure s ≤ liftLinear f hf μ s := le_toMeasure_apply _ (hf μ) s #align measure_theory.measure.le_lift_linear_apply MeasureTheory.Measure.le_liftLinear_apply def mapₗ [MeasurableSpace α] (f : α → β) : Measure α →ₗ[ℝ≥0∞] Measure β := if hf : Measurable f then liftLinear (OuterMeasure.map f) fun μ _s hs t => le_toOuterMeasure_caratheodory μ _ (hf hs) (f ⁻¹' t) else 0 #align measure_theory.measure.mapₗ MeasureTheory.Measure.mapₗ theorem mapₗ_congr {f g : α → β} (hf : Measurable f) (hg : Measurable g) (h : f =ᵐ[μ] g) : mapₗ f μ = mapₗ g μ := by ext1 s hs simpa only [mapₗ, hf, hg, hs, dif_pos, liftLinear_apply, OuterMeasure.map_apply] using measure_congr (h.preimage s) #align measure_theory.measure.mapₗ_congr MeasureTheory.Measure.mapₗ_congr irreducible_def map [MeasurableSpace α] (f : α → β) (μ : Measure α) : Measure β := if hf : AEMeasurable f μ then mapₗ (hf.mk f) μ else 0 #align measure_theory.measure.map MeasureTheory.Measure.map theorem mapₗ_mk_apply_of_aemeasurable {f : α → β} (hf : AEMeasurable f μ) : mapₗ (hf.mk f) μ = map f μ := by simp [map, hf] #align measure_theory.measure.mapₗ_mk_apply_of_ae_measurable MeasureTheory.Measure.mapₗ_mk_apply_of_aemeasurable theorem mapₗ_apply_of_measurable {f : α → β} (hf : Measurable f) (μ : Measure α) : mapₗ f μ = map f μ := by simp only [← mapₗ_mk_apply_of_aemeasurable hf.aemeasurable] exact mapₗ_congr hf hf.aemeasurable.measurable_mk hf.aemeasurable.ae_eq_mk #align measure_theory.measure.mapₗ_apply_of_measurable MeasureTheory.Measure.mapₗ_apply_of_measurable @[simp] theorem map_add (μ ν : Measure α) {f : α → β} (hf : Measurable f) : (μ + ν).map f = μ.map f + ν.map f := by simp [← mapₗ_apply_of_measurable hf] #align measure_theory.measure.map_add MeasureTheory.Measure.map_add @[simp] theorem map_zero (f : α → β) : (0 : Measure α).map f = 0 := by by_cases hf : AEMeasurable f (0 : Measure α) <;> simp [map, hf] #align measure_theory.measure.map_zero MeasureTheory.Measure.map_zero @[simp] theorem map_of_not_aemeasurable {f : α → β} {μ : Measure α} (hf : ¬AEMeasurable f μ) : μ.map f = 0 := by simp [map, hf] #align measure_theory.measure.map_of_not_ae_measurable MeasureTheory.Measure.map_of_not_aemeasurable theorem map_congr {f g : α → β} (h : f =ᵐ[μ] g) : Measure.map f μ = Measure.map g μ := by by_cases hf : AEMeasurable f μ · have hg : AEMeasurable g μ := hf.congr h simp only [← mapₗ_mk_apply_of_aemeasurable hf, ← mapₗ_mk_apply_of_aemeasurable hg] exact mapₗ_congr hf.measurable_mk hg.measurable_mk (hf.ae_eq_mk.symm.trans (h.trans hg.ae_eq_mk)) · have hg : ¬AEMeasurable g μ := by simpa [← aemeasurable_congr h] using hf simp [map_of_not_aemeasurable, hf, hg] #align measure_theory.measure.map_congr MeasureTheory.Measure.map_congr @[simp] protected theorem map_smul (c : ℝ≥0∞) (μ : Measure α) (f : α → β) : (c • μ).map f = c • μ.map f := by rcases eq_or_ne c 0 with (rfl \| hc); · simp by_cases hf : AEMeasurable f μ · have hfc : AEMeasurable f (c • μ) := ⟨hf.mk f, hf.measurable_mk, (ae_smul_measure_iff hc).2 hf.ae_eq_mk⟩ simp only [← mapₗ_mk_apply_of_aemeasurable hf, ← mapₗ_mk_apply_of_aemeasurable hfc, LinearMap.map_smulₛₗ, RingHom.id_apply] congr 1 apply mapₗ_congr hfc.measurable_mk hf.measurable_mk exact EventuallyEq.trans ((ae_smul_measure_iff hc).1 hfc.ae_eq_mk.symm) hf.ae_eq_mk · have hfc : ¬AEMeasurable f (c • μ) := by intro hfc exact hf ⟨hfc.mk f, hfc.measurable_mk, (ae_smul_measure_iff hc).1 hfc.ae_eq_mk⟩ simp [map_of_not_aemeasurable hf, map_of_not_aemeasurable hfc] #align measure_theory.measure.map_smul MeasureTheory.Measure.map_smul @[simp] protected theorem map_smul_nnreal (c : ℝ≥0) (μ : Measure α) (f : α → β) : (c • μ).map f = c • μ.map f := μ.map_smul (c : ℝ≥0∞) f #align measure_theory.measure.map_smul_nnreal MeasureTheory.Measure.map_smul_nnreal variable {f : α → β} lemma map_apply₀ {f : α → β} (hf : AEMeasurable f μ) {s : Set β} (hs : NullMeasurableSet s (map f μ)) : μ.map f s = μ (f ⁻¹' s) := by rw [map, dif_pos hf, mapₗ, dif_pos hf.measurable_mk] at hs ⊢ rw [liftLinear_apply₀ _ hs, measure_congr (hf.ae_eq_mk.preimage s)] rfl @[simp] theorem map_apply_of_aemeasurable (hf : AEMeasurable f μ) {s : Set β} (hs : MeasurableSet s) : μ.map f s = μ (f ⁻¹' s) := map_apply₀ hf hs.nullMeasurableSet #align measure_theory.measure.map_apply_of_ae_measurable MeasureTheory.Measure.map_apply_of_aemeasurable @[simp] theorem map_apply (hf : Measurable f) {s : Set β} (hs : MeasurableSet s) : μ.map f s = μ (f ⁻¹' s) := map_apply_of_aemeasurable hf.aemeasurable hs #align measure_theory.measure.map_apply MeasureTheory.Measure.map_apply theorem map_toOuterMeasure (hf : AEMeasurable f μ) : (μ.map f).toOuterMeasure = (OuterMeasure.map f μ.toOuterMeasure).trim := by rw [← trimmed, OuterMeasure.trim_eq_trim_iff] intro s hs simp [hf, hs] #align measure_theory.measure.map_to_outer_measure MeasureTheory.Measure.map_toOuterMeasure @[simp] lemma map_eq_zero_iff (hf : AEMeasurable f μ) : μ.map f = 0 ↔ μ = 0 := by simp_rw [← measure_univ_eq_zero, map_apply_of_aemeasurable hf .univ, preimage_univ] @[simp] lemma mapₗ_eq_zero_iff (hf : Measurable f) : Measure.mapₗ f μ = 0 ↔ μ = 0 := by rw [mapₗ_apply_of_measurable hf, map_eq_zero_iff hf.aemeasurable] lemma map_ne_zero_iff (hf : AEMeasurable f μ) : μ.map f ≠ 0 ↔ μ ≠ 0 := (map_eq_zero_iff hf).not lemma mapₗ_ne_zero_iff (hf : Measurable f) : Measure.mapₗ f μ ≠ 0 ↔ μ ≠ 0 := (mapₗ_eq_zero_iff hf).not @[simp] theorem map_id : map id μ = μ := ext fun _ => map_apply measurable_id #align measure_theory.measure.map_id MeasureTheory.Measure.map_id @[simp] theorem map_id' : map (fun x => x) μ = μ := map_id #align measure_theory.measure.map_id' MeasureTheory.Measure.map_id' theorem map_map {g : β → γ} {f : α → β} (hg : Measurable g) (hf : Measurable f) : (μ.map f).map g = μ.map (g ∘ f) := ext fun s hs => by simp [hf, hg, hs, hg hs, hg.comp hf, ← preimage_comp] #align measure_theory.measure.map_map MeasureTheory.Measure.map_map @[mono] theorem map_mono {f : α → β} (h : μ ≤ ν) (hf : Measurable f) : μ.map f ≤ ν.map f := le_iff.2 fun s hs ↦ by simp [hf.aemeasurable, hs, h _] #align measure_theory.measure.map_mono MeasureTheory.Measure.map_mono theorem le_map_apply {f : α → β} (hf : AEMeasurable f μ) (s : Set β) : μ (f ⁻¹' s) ≤ μ.map f s := calc μ (f ⁻¹' s) ≤ μ (f ⁻¹' toMeasurable (μ.map f) s) := by gcongr; apply subset_toMeasurable _ = μ.map f (toMeasurable (μ.map f) s) := (map_apply_of_aemeasurable hf <\| measurableSet_toMeasurable _ _).symm _ = μ.map f s := measure_toMeasurable _ #align measure_theory.measure.le_map_apply MeasureTheory.Measure.le_map_apply theorem le_map_apply_image {f : α → β} (hf : AEMeasurable f μ) (s : Set α) : μ s ≤ μ.map f (f '' s) := (measure_mono (subset_preimage_image f s)).trans (le_map_apply hf _) theorem preimage_null_of_map_null {f : α → β} (hf : AEMeasurable f μ) {s : Set β} (hs : μ.map f s = 0) : μ (f ⁻¹' s) = 0 := nonpos_iff_eq_zero.mp <\| (le_map_apply hf s).trans_eq hs #align measure_theory.measure.preimage_null_of_map_null MeasureTheory.Measure.preimage_null_of_map_null theorem tendsto_ae_map {f : α → β} (hf : AEMeasurable f μ) : Tendsto f (ae μ) (ae (μ.map f)) := fun _ hs => preimage_null_of_map_null hf hs #align measure_theory.measure.tendsto_ae_map MeasureTheory.Measure.tendsto_ae_map def comapₗ [MeasurableSpace α] (f : α → β) : Measure β →ₗ[ℝ≥0∞] Measure α := if hf : Injective f ∧ ∀ s, MeasurableSet s → MeasurableSet (f '' s) then liftLinear (OuterMeasure.comap f) fun μ s hs t => by simp only [OuterMeasure.comap_apply, image_inter hf.1, image_diff hf.1] apply le_toOuterMeasure_caratheodory exact hf.2 s hs else 0 #align measure_theory.measure.comapₗ MeasureTheory.Measure.comapₗ theorem comapₗ_apply {β} [MeasurableSpace α] {mβ : MeasurableSpace β} (f : α → β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → MeasurableSet (f '' s)) (μ : Measure β) (hs : MeasurableSet s) : comapₗ f μ s = μ (f '' s) := by rw [comapₗ, dif_pos, liftLinear_apply _ hs, OuterMeasure.comap_apply, coe_toOuterMeasure] exact ⟨hfi, hf⟩ #align measure_theory.measure.comapₗ_apply MeasureTheory.Measure.comapₗ_apply def comap [MeasurableSpace α] (f : α → β) (μ : Measure β) : Measure α := if hf : Injective f ∧ ∀ s, MeasurableSet s → NullMeasurableSet (f '' s) μ then (OuterMeasure.comap f μ.toOuterMeasure).toMeasure fun s hs t => by simp only [OuterMeasure.comap_apply, image_inter hf.1, image_diff hf.1] exact (measure_inter_add_diff₀ _ (hf.2 s hs)).symm else 0 #align measure_theory.measure.comap MeasureTheory.Measure.comap theorem comap_apply₀ [MeasurableSpace α] (f : α → β) (μ : Measure β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → NullMeasurableSet (f '' s) μ) (hs : NullMeasurableSet s (comap f μ)) : comap f μ s = μ (f '' s) := by rw [comap, dif_pos (And.intro hfi hf)] at hs ⊢ rw [toMeasure_apply₀ _ _ hs, OuterMeasure.comap_apply, coe_toOuterMeasure] #align measure_theory.measure.comap_apply₀ MeasureTheory.Measure.comap_apply₀ theorem le_comap_apply {β} [MeasurableSpace α] {mβ : MeasurableSpace β} (f : α → β) (μ : Measure β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → NullMeasurableSet (f '' s) μ) (s : Set α) : μ (f '' s) ≤ comap f μ s := by rw [comap, dif_pos (And.intro hfi hf)] exact le_toMeasure_apply _ _ _ #align measure_theory.measure.le_comap_apply MeasureTheory.Measure.le_comap_apply theorem comap_apply {β} [MeasurableSpace α] {_mβ : MeasurableSpace β} (f : α → β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → MeasurableSet (f '' s)) (μ : Measure β) (hs : MeasurableSet s) : comap f μ s = μ (f '' s) := comap_apply₀ f μ hfi (fun s hs => (hf s hs).nullMeasurableSet) hs.nullMeasurableSet #align measure_theory.measure.comap_apply MeasureTheory.Measure.comap_apply theorem comapₗ_eq_comap {β} [MeasurableSpace α] {_mβ : MeasurableSpace β} (f : α → β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → MeasurableSet (f '' s)) (μ : Measure β) (hs : MeasurableSet s) : comapₗ f μ s = comap f μ s := (comapₗ_apply f hfi hf μ hs).trans (comap_apply f hfi hf μ hs).symm #align measure_theory.measure.comapₗ_eq_comap MeasureTheory.Measure.comapₗ_eq_comap theorem measure_image_eq_zero_of_comap_eq_zero {β} [MeasurableSpace α] {_mβ : MeasurableSpace β} (f : α → β) (μ : Measure β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → NullMeasurableSet (f '' s) μ) {s : Set α} (hs : comap f μ s = 0) : μ (f '' s) = 0 := le_antisymm ((le_comap_apply f μ hfi hf s).trans hs.le) (zero_le _) #align measure_theory.measure.measure_image_eq_zero_of_comap_eq_zero MeasureTheory.Measure.measure_image_eq_zero_of_comap_eq_zero theorem ae_eq_image_of_ae_eq_comap {β} [MeasurableSpace α] {mβ : MeasurableSpace β} (f : α → β) (μ : Measure β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → NullMeasurableSet (f '' s) μ) {s t : Set α} (hst : s =ᵐ[comap f μ] t) : f '' s =ᵐ[μ] f '' t := by rw [EventuallyEq, ae_iff] at hst ⊢ have h_eq_α : { a : α \| ¬s a = t a } = s \ t ∪ t \ s := by ext1 x simp only [eq_iff_iff, mem_setOf_eq, mem_union, mem_diff] tauto have h_eq_β : { a : β \| ¬(f '' s) a = (f '' t) a } = f '' s \ f '' t ∪ f '' t \ f '' s := by ext1 x simp only [eq_iff_iff, mem_setOf_eq, mem_union, mem_diff] tauto rw [← Set.image_diff hfi, ← Set.image_diff hfi, ← Set.image_union] at h_eq_β rw [h_eq_β] rw [h_eq_α] at hst exact measure_image_eq_zero_of_comap_eq_zero f μ hfi hf hst #align measure_theory.measure.ae_eq_image_of_ae_eq_comap MeasureTheory.Measure.ae_eq_image_of_ae_eq_comap theorem NullMeasurableSet.image {β} [MeasurableSpace α] {mβ : MeasurableSpace β} (f : α → β) (μ : Measure β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → NullMeasurableSet (f '' s) μ) {s : Set α} (hs : NullMeasurableSet s (μ.comap f)) : NullMeasurableSet (f '' s) μ := by refine ⟨toMeasurable μ (f '' toMeasurable (μ.comap f) s), measurableSet_toMeasurable _ _, ?_⟩ refine EventuallyEq.trans ?_ (NullMeasurableSet.toMeasurable_ae_eq ?_).symm swap · exact hf _ (measurableSet_toMeasurable _ _) have h : toMeasurable (comap f μ) s =ᵐ[comap f μ] s := NullMeasurableSet.toMeasurable_ae_eq hs exact ae_eq_image_of_ae_eq_comap f μ hfi hf h.symm #align measure_theory.measure.null_measurable_set.image MeasureTheory.Measure.NullMeasurableSet.image theorem comap_preimage {β} [MeasurableSpace α] {mβ : MeasurableSpace β} (f : α → β) (μ : Measure β) {s : Set β} (hf : Injective f) (hf' : Measurable f) (h : ∀ t, MeasurableSet t → NullMeasurableSet (f '' t) μ) (hs : MeasurableSet s) : μ.comap f (f ⁻¹' s) = μ (s ∩ range f) := by rw [comap_apply₀ _ _ hf h (hf' hs).nullMeasurableSet, image_preimage_eq_inter_range] #align measure_theory.measure.comap_preimage MeasureTheory.Measure.comap_preimage def AbsolutelyContinuous {_m0 : MeasurableSpace α} (μ ν : Measure α) : Prop := ∀ ⦃s : Set α⦄, ν s = 0 → μ s = 0 #align measure_theory.measure.absolutely_continuous MeasureTheory.Measure.AbsolutelyContinuous @[inherit_doc MeasureTheory.Measure.AbsolutelyContinuous] scoped[MeasureTheory] infixl:50 " ≪ " => MeasureTheory.Measure.AbsolutelyContinuous theorem absolutelyContinuous_of_le (h : μ ≤ ν) : μ ≪ ν := fun s hs => nonpos_iff_eq_zero.1 <\| hs ▸ le_iff'.1 h s #align measure_theory.measure.absolutely_continuous_of_le MeasureTheory.Measure.absolutelyContinuous_of_le alias _root_.LE.le.absolutelyContinuous := absolutelyContinuous_of_le #align has_le.le.absolutely_continuous LE.le.absolutelyContinuous theorem absolutelyContinuous_of_eq (h : μ = ν) : μ ≪ ν := h.le.absolutelyContinuous #align measure_theory.measure.absolutely_continuous_of_eq MeasureTheory.Measure.absolutelyContinuous_of_eq alias _root_.Eq.absolutelyContinuous := absolutelyContinuous_of_eq #align eq.absolutely_continuous Eq.absolutelyContinuous @[simp] lemma absolutelyContinuous_zero_iff : μ ≪ 0 ↔ μ = 0 := ⟨fun h ↦ measure_univ_eq_zero.mp (h rfl), fun h ↦ h.symm ▸ AbsolutelyContinuous.zero _⟩ alias absolutelyContinuous_refl := AbsolutelyContinuous.refl alias absolutelyContinuous_rfl := AbsolutelyContinuous.rfl lemma absolutelyContinuous_sum_left {μs : ι → Measure α} (hμs : ∀ i, μs i ≪ ν) : Measure.sum μs ≪ ν := AbsolutelyContinuous.mk fun s hs hs0 ↦ by simp [sum_apply _ hs, fun i ↦ hμs i hs0] lemma absolutelyContinuous_sum_right {μs : ι → Measure α} (i : ι) (hνμ : ν ≪ μs i) : ν ≪ Measure.sum μs := by refine AbsolutelyContinuous.mk fun s hs hs0 ↦ ?_ simp only [sum_apply _ hs, ENNReal.tsum_eq_zero] at hs0 exact hνμ (hs0 i) theorem absolutelyContinuous_of_le_smul {μ' : Measure α} {c : ℝ≥0∞} (hμ'_le : μ' ≤ c • μ) : μ' ≪ μ := (Measure.absolutelyContinuous_of_le hμ'_le).trans (Measure.AbsolutelyContinuous.rfl.smul c) #align measure_theory.measure.absolutely_continuous_of_le_smul MeasureTheory.Measure.absolutelyContinuous_of_le_smul lemma smul_absolutelyContinuous {c : ℝ≥0∞} : c • μ ≪ μ := absolutelyContinuous_of_le_smul le_rfl lemma absolutelyContinuous_smul {c : ℝ≥0∞} (hc : c ≠ 0) : μ ≪ c • μ := by simp [AbsolutelyContinuous, hc] theorem ae_le_iff_absolutelyContinuous : ae μ ≤ ae ν ↔ μ ≪ ν := ⟨fun h s => by rw [measure_zero_iff_ae_nmem, measure_zero_iff_ae_nmem] exact fun hs => h hs, fun h s hs => h hs⟩ #align measure_theory.measure.ae_le_iff_absolutely_continuous MeasureTheory.Measure.ae_le_iff_absolutelyContinuous alias ⟨_root_.LE.le.absolutelyContinuous_of_ae, AbsolutelyContinuous.ae_le⟩ := ae_le_iff_absolutelyContinuous #align has_le.le.absolutely_continuous_of_ae LE.le.absolutelyContinuous_of_ae #align measure_theory.measure.absolutely_continuous.ae_le MeasureTheory.Measure.AbsolutelyContinuous.ae_le alias ae_mono' := AbsolutelyContinuous.ae_le #align measure_theory.measure.ae_mono' MeasureTheory.Measure.ae_mono' theorem AbsolutelyContinuous.ae_eq (h : μ ≪ ν) {f g : α → δ} (h' : f =ᵐ[ν] g) : f =ᵐ[μ] g := h.ae_le h' #align measure_theory.measure.absolutely_continuous.ae_eq MeasureTheory.Measure.AbsolutelyContinuous.ae_eq protected theorem _root_.MeasureTheory.AEDisjoint.of_absolutelyContinuous (h : AEDisjoint μ s t) {ν : Measure α} (h' : ν ≪ μ) : AEDisjoint ν s t := h' h protected theorem _root_.MeasureTheory.AEDisjoint.of_le (h : AEDisjoint μ s t) {ν : Measure α} (h' : ν ≤ μ) : AEDisjoint ν s t := h.of_absolutelyContinuous (Measure.absolutelyContinuous_of_le h') structure QuasiMeasurePreserving {m0 : MeasurableSpace α} (f : α → β) (μa : Measure α := by volume_tac) (μb : Measure β := by volume_tac) : Prop where protected measurable : Measurable f protected absolutelyContinuous : μa.map f ≪ μb #align measure_theory.measure.quasi_measure_preserving MeasureTheory.Measure.QuasiMeasurePreserving #align measure_theory.measure.quasi_measure_preserving.measurable MeasureTheory.Measure.QuasiMeasurePreserving.measurable #align measure_theory.measure.quasi_measure_preserving.absolutely_continuous MeasureTheory.Measure.QuasiMeasurePreserving.absolutelyContinuous open Measure open MeasureTheory protected theorem _root_.AEMeasurable.nullMeasurable {f : α → β} (h : AEMeasurable f μ) : NullMeasurable f μ := let ⟨_g, hgm, hg⟩ := h; hgm.nullMeasurable.congr hg.symm #align ae_measurable.null_measurable AEMeasurable.nullMeasurable lemma _root_.AEMeasurable.nullMeasurableSet_preimage {f : α → β} {s : Set β} (hf : AEMeasurable f μ) (hs : MeasurableSet s) : NullMeasurableSet (f ⁻¹' s) μ := hf.nullMeasurable hs theorem NullMeasurableSet.preimage {ν : Measure β} {f : α → β} {t : Set β} (ht : NullMeasurableSet t ν) (hf : QuasiMeasurePreserving f μ ν) : NullMeasurableSet (f ⁻¹' t) μ := ⟨f ⁻¹' toMeasurable ν t, hf.measurable (measurableSet_toMeasurable _ _), hf.ae_eq ht.toMeasurable_ae_eq.symm⟩ #align measure_theory.null_measurable_set.preimage MeasureTheory.NullMeasurableSet.preimage theorem NullMeasurableSet.mono_ac (h : NullMeasurableSet s μ) (hle : ν ≪ μ) : NullMeasurableSet s ν := h.preimage <\| (QuasiMeasurePreserving.id μ).mono_left hle #align measure_theory.null_measurable_set.mono_ac MeasureTheory.NullMeasurableSet.mono_ac theorem NullMeasurableSet.mono (h : NullMeasurableSet s μ) (hle : ν ≤ μ) : NullMeasurableSet s ν := h.mono_ac hle.absolutelyContinuous #align measure_theory.null_measurable_set.mono MeasureTheory.NullMeasurableSet.mono theorem AEDisjoint.preimage {ν : Measure β} {f : α → β} {s t : Set β} (ht : AEDisjoint ν s t) (hf : QuasiMeasurePreserving f μ ν) : AEDisjoint μ (f ⁻¹' s) (f ⁻¹' t) := hf.preimage_null ht #align measure_theory.ae_disjoint.preimage MeasureTheory.AEDisjoint.preimage @[simp] theorem ae_eq_bot : ae μ = ⊥ ↔ μ = 0 := by rw [← empty_mem_iff_bot, mem_ae_iff, compl_empty, measure_univ_eq_zero] #align measure_theory.ae_eq_bot MeasureTheory.ae_eq_bot @[simp] theorem ae_neBot : (ae μ).NeBot ↔ μ ≠ 0 := neBot_iff.trans (not_congr ae_eq_bot) #align measure_theory.ae_ne_bot MeasureTheory.ae_neBot instance Measure.ae.neBot [NeZero μ] : (ae μ).NeBot := ae_neBot.2 <\| NeZero.ne μ @[simp] theorem ae_zero {_m0 : MeasurableSpace α} : ae (0 : Measure α) = ⊥ := ae_eq_bot.2 rfl #align measure_theory.ae_zero MeasureTheory.ae_zero @[mono] theorem ae_mono (h : μ ≤ ν) : ae μ ≤ ae ν := h.absolutelyContinuous.ae_le #align measure_theory.ae_mono MeasureTheory.ae_mono theorem mem_ae_map_iff {f : α → β} (hf : AEMeasurable f μ) {s : Set β} (hs : MeasurableSet s) : s ∈ ae (μ.map f) ↔ f ⁻¹' s ∈ ae μ := by simp only [mem_ae_iff, map_apply_of_aemeasurable hf hs.compl, preimage_compl] #align measure_theory.mem_ae_map_iff MeasureTheory.mem_ae_map_iff theorem mem_ae_of_mem_ae_map {f : α → β} (hf : AEMeasurable f μ) {s : Set β} (hs : s ∈ ae (μ.map f)) : f ⁻¹' s ∈ ae μ := (tendsto_ae_map hf).eventually hs #align measure_theory.mem_ae_of_mem_ae_map MeasureTheory.mem_ae_of_mem_ae_map theorem ae_map_iff {f : α → β} (hf : AEMeasurable f μ) {p : β → Prop} (hp : MeasurableSet { x \| p x }) : (∀ᵐ y ∂μ.map f, p y) ↔ ∀ᵐ x ∂μ, p (f x) := mem_ae_map_iff hf hp #align measure_theory.ae_map_iff MeasureTheory.ae_map_iff theorem ae_of_ae_map {f : α → β} (hf : AEMeasurable f μ) {p : β → Prop} (h : ∀ᵐ y ∂μ.map f, p y) : ∀ᵐ x ∂μ, p (f x) := mem_ae_of_mem_ae_map hf h #align measure_theory.ae_of_ae_map MeasureTheory.ae_of_ae_map theorem ae_map_mem_range {m0 : MeasurableSpace α} (f : α → β) (hf : MeasurableSet (range f)) (μ : Measure α) : ∀ᵐ x ∂μ.map f, x ∈ range f := by by_cases h : AEMeasurable f μ · change range f ∈ ae (μ.map f) rw [mem_ae_map_iff h hf] filter_upwards using mem_range_self · simp [map_of_not_aemeasurable h] #align measure_theory.ae_map_mem_range MeasureTheory.ae_map_mem_range section Intervals	Mathlib/MeasureTheory/Measure/MeasureSpace.lean	2,039	2,046	theorem biSup_measure_Iic [Preorder α] {s : Set α} (hsc : s.Countable) (hst : ∀ x : α, ∃ y ∈ s, x ≤ y) (hdir : DirectedOn (· ≤ ·) s) : ⨆ x ∈ s, μ (Iic x) = μ univ := by	rw [← measure_biUnion_eq_iSup hsc] · congr simp only [← bex_def] at hst exact iUnion₂_eq_univ_iff.2 hst · exact directedOn_iff_directed.2 (hdir.directed_val.mono_comp _ fun x y => Iic_subset_Iic.2)
import Mathlib.Algebra.Order.Group.Nat import Mathlib.Data.Finset.Antidiagonal import Mathlib.Data.Finset.Card import Mathlib.Data.Multiset.NatAntidiagonal #align_import data.finset.nat_antidiagonal from "leanprover-community/mathlib"@"9003f28797c0664a49e4179487267c494477d853" open Function namespace Finset namespace Nat instance instHasAntidiagonal : HasAntidiagonal ℕ where antidiagonal n := ⟨Multiset.Nat.antidiagonal n, Multiset.Nat.nodup_antidiagonal n⟩ mem_antidiagonal {n} {xy} := by rw [mem_def, Multiset.Nat.mem_antidiagonal] lemma antidiagonal_eq_map (n : ℕ) : antidiagonal n = (range (n + 1)).map ⟨fun i ↦ (i, n - i), fun _ _ h ↦ (Prod.ext_iff.1 h).1⟩ := rfl lemma antidiagonal_eq_map' (n : ℕ) : antidiagonal n = (range (n + 1)).map ⟨fun i ↦ (n - i, i), fun _ _ h ↦ (Prod.ext_iff.1 h).2⟩ := by rw [← map_swap_antidiagonal, antidiagonal_eq_map, map_map]; rfl lemma antidiagonal_eq_image (n : ℕ) : antidiagonal n = (range (n + 1)).image fun i ↦ (i, n - i) := by simp only [antidiagonal_eq_map, map_eq_image, Function.Embedding.coeFn_mk] lemma antidiagonal_eq_image' (n : ℕ) : antidiagonal n = (range (n + 1)).image fun i ↦ (n - i, i) := by simp only [antidiagonal_eq_map', map_eq_image, Function.Embedding.coeFn_mk] @[simp] theorem card_antidiagonal (n : ℕ) : (antidiagonal n).card = n + 1 := by simp [antidiagonal] #align finset.nat.card_antidiagonal Finset.Nat.card_antidiagonal -- nolint as this is for dsimp @[simp, nolint simpNF] theorem antidiagonal_zero : antidiagonal 0 = {(0, 0)} := rfl #align finset.nat.antidiagonal_zero Finset.Nat.antidiagonal_zero theorem antidiagonal_succ (n : ℕ) : antidiagonal (n + 1) = cons (0, n + 1) ((antidiagonal n).map (Embedding.prodMap ⟨Nat.succ, Nat.succ_injective⟩ (Embedding.refl _))) (by simp) := by apply eq_of_veq rw [cons_val, map_val] apply Multiset.Nat.antidiagonal_succ #align finset.nat.antidiagonal_succ Finset.Nat.antidiagonal_succ theorem antidiagonal_succ' (n : ℕ) : antidiagonal (n + 1) = cons (n + 1, 0) ((antidiagonal n).map (Embedding.prodMap (Embedding.refl _) ⟨Nat.succ, Nat.succ_injective⟩)) (by simp) := by apply eq_of_veq rw [cons_val, map_val] exact Multiset.Nat.antidiagonal_succ' #align finset.nat.antidiagonal_succ' Finset.Nat.antidiagonal_succ'	Mathlib/Data/Finset/NatAntidiagonal.lean	89	99	theorem antidiagonal_succ_succ' {n : ℕ} : antidiagonal (n + 2) = cons (0, n + 2) (cons (n + 2, 0) ((antidiagonal n).map (Embedding.prodMap ⟨Nat.succ, Nat.succ_injective⟩ ⟨Nat.succ, Nat.succ_injective⟩)) <\| by simp) (by simp) := by	simp_rw [antidiagonal_succ (n + 1), antidiagonal_succ', Finset.map_cons, map_map] rfl
import Mathlib.Algebra.Homology.Additive import Mathlib.AlgebraicTopology.MooreComplex import Mathlib.Algebra.BigOperators.Fin import Mathlib.CategoryTheory.Preadditive.Opposite import Mathlib.CategoryTheory.Idempotents.FunctorCategories #align_import algebraic_topology.alternating_face_map_complex from "leanprover-community/mathlib"@"88bca0ce5d22ebfd9e73e682e51d60ea13b48347" open CategoryTheory CategoryTheory.Limits CategoryTheory.Subobject open CategoryTheory.Preadditive CategoryTheory.Category CategoryTheory.Idempotents open Opposite open Simplicial noncomputable section namespace AlgebraicTopology namespace AlternatingFaceMapComplex variable {C : Type*} [Category C] [Preadditive C] variable (X : SimplicialObject C) variable (Y : SimplicialObject C) @[simp] def objD (n : ℕ) : X _[n + 1] ⟶ X _[n] := ∑ i : Fin (n + 2), (-1 : ℤ) ^ (i : ℕ) • X.δ i #align algebraic_topology.alternating_face_map_complex.obj_d AlgebraicTopology.AlternatingFaceMapComplex.objD	Mathlib/AlgebraicTopology/AlternatingFaceMapComplex.lean	70	112	theorem d_squared (n : ℕ) : objD X (n + 1) ≫ objD X n = 0 := by	-- we start by expanding d ≫ d as a double sum dsimp simp only [comp_sum, sum_comp, ← Finset.sum_product'] -- then, we decompose the index set P into a subset S and its complement Sᶜ let P := Fin (n + 2) × Fin (n + 3) let S := Finset.univ.filter fun ij : P => (ij.2 : ℕ) ≤ (ij.1 : ℕ) erw [← Finset.sum_add_sum_compl S, ← eq_neg_iff_add_eq_zero, ← Finset.sum_neg_distrib] /- we are reduced to showing that two sums are equal, and this is obtained by constructing a bijection φ : S -> Sᶜ, which maps (i,j) to (j,i+1), and by comparing the terms -/ let φ : ∀ ij : P, ij ∈ S → P := fun ij hij => (Fin.castLT ij.2 (lt_of_le_of_lt (Finset.mem_filter.mp hij).right (Fin.is_lt ij.1)), ij.1.succ) apply Finset.sum_bij φ · -- φ(S) is contained in Sᶜ intro ij hij simp only [S, Finset.mem_univ, Finset.compl_filter, Finset.mem_filter, true_and_iff, Fin.val_succ, Fin.coe_castLT] at hij ⊢ linarith · -- φ : S → Sᶜ is injective rintro ⟨i, j⟩ hij ⟨i', j'⟩ hij' h rw [Prod.mk.inj_iff] exact ⟨by simpa using congr_arg Prod.snd h, by simpa [Fin.castSucc_castLT] using congr_arg Fin.castSucc (congr_arg Prod.fst h)⟩ · -- φ : S → Sᶜ is surjective rintro ⟨i', j'⟩ hij' simp only [S, Finset.mem_univ, forall_true_left, Prod.forall, ge_iff_le, Finset.compl_filter, not_le, Finset.mem_filter, true_and] at hij' refine ⟨(j'.pred <\| ?_, Fin.castSucc i'), ?_, ?_⟩ · rintro rfl simp only [Fin.val_zero, not_lt_zero'] at hij' · simpa only [S, Finset.mem_univ, forall_true_left, Prod.forall, ge_iff_le, Finset.mem_filter, Fin.coe_castSucc, Fin.coe_pred, true_and] using Nat.le_sub_one_of_lt hij' · simp only [φ, Fin.castLT_castSucc, Fin.succ_pred] · -- identification of corresponding terms in both sums rintro ⟨i, j⟩ hij dsimp simp only [zsmul_comp, comp_zsmul, smul_smul, ← neg_smul] congr 1 · simp only [Fin.val_succ, pow_add, pow_one, mul_neg, neg_neg, mul_one] apply mul_comm · rw [CategoryTheory.SimplicialObject.δ_comp_δ''] simpa [S] using hij
import Mathlib.Data.Fin.VecNotation import Mathlib.SetTheory.Cardinal.Basic #align_import model_theory.basic from "leanprover-community/mathlib"@"369525b73f229ccd76a6ec0e0e0bf2be57599768" set_option autoImplicit true universe u v u' v' w w' open Cardinal open Cardinal namespace FirstOrder -- intended to be used with explicit universe parameters @[nolint checkUnivs] structure Language where Functions : ℕ → Type u Relations : ℕ → Type v #align first_order.language FirstOrder.Language --@[simp] def Sequence₂ (a₀ a₁ a₂ : Type u) : ℕ → Type u \| 0 => a₀ \| 1 => a₁ \| 2 => a₂ \| _ => PEmpty #align first_order.sequence₂ FirstOrder.Sequence₂ namespace Language @[simps] protected def mk₂ (c f₁ f₂ : Type u) (r₁ r₂ : Type v) : Language := ⟨Sequence₂ c f₁ f₂, Sequence₂ PEmpty r₁ r₂⟩ #align first_order.language.mk₂ FirstOrder.Language.mk₂ protected def empty : Language := ⟨fun _ => Empty, fun _ => Empty⟩ #align first_order.language.empty FirstOrder.Language.empty instance : Inhabited Language := ⟨Language.empty⟩ protected def sum (L : Language.{u, v}) (L' : Language.{u', v'}) : Language := ⟨fun n => Sum (L.Functions n) (L'.Functions n), fun n => Sum (L.Relations n) (L'.Relations n)⟩ #align first_order.language.sum FirstOrder.Language.sum variable (L : Language.{u, v}) -- Porting note(#5171): this linter isn't ported yet. -- @[nolint has_nonempty_instance] protected def Constants := L.Functions 0 #align first_order.language.constants FirstOrder.Language.Constants @[simp] theorem constants_mk₂ (c f₁ f₂ : Type u) (r₁ r₂ : Type v) : (Language.mk₂ c f₁ f₂ r₁ r₂).Constants = c := rfl #align first_order.language.constants_mk₂ FirstOrder.Language.constants_mk₂ -- Porting note(#5171): this linter isn't ported yet. -- @[nolint has_nonempty_instance] def Symbols := Sum (Σl, L.Functions l) (Σl, L.Relations l) #align first_order.language.symbols FirstOrder.Language.Symbols def card : Cardinal := #L.Symbols #align first_order.language.card FirstOrder.Language.card class IsRelational : Prop where empty_functions : ∀ n, IsEmpty (L.Functions n) #align first_order.language.is_relational FirstOrder.Language.IsRelational class IsAlgebraic : Prop where empty_relations : ∀ n, IsEmpty (L.Relations n) #align first_order.language.is_algebraic FirstOrder.Language.IsAlgebraic variable {L} {L' : Language.{u', v'}} theorem card_eq_card_functions_add_card_relations : L.card = (Cardinal.sum fun l => Cardinal.lift.{v} #(L.Functions l)) + Cardinal.sum fun l => Cardinal.lift.{u} #(L.Relations l) := by simp [card, Symbols] #align first_order.language.card_eq_card_functions_add_card_relations FirstOrder.Language.card_eq_card_functions_add_card_relations instance [L.IsRelational] {n : ℕ} : IsEmpty (L.Functions n) := IsRelational.empty_functions n instance [L.IsAlgebraic] {n : ℕ} : IsEmpty (L.Relations n) := IsAlgebraic.empty_relations n instance isRelational_of_empty_functions {symb : ℕ → Type} : IsRelational ⟨fun _ => Empty, symb⟩ := ⟨fun _ => instIsEmptyEmpty⟩ #align first_order.language.is_relational_of_empty_functions FirstOrder.Language.isRelational_of_empty_functions instance isAlgebraic_of_empty_relations {symb : ℕ → Type} : IsAlgebraic ⟨symb, fun _ => Empty⟩ := ⟨fun _ => instIsEmptyEmpty⟩ #align first_order.language.is_algebraic_of_empty_relations FirstOrder.Language.isAlgebraic_of_empty_relations instance isRelational_empty : IsRelational Language.empty := Language.isRelational_of_empty_functions #align first_order.language.is_relational_empty FirstOrder.Language.isRelational_empty instance isAlgebraic_empty : IsAlgebraic Language.empty := Language.isAlgebraic_of_empty_relations #align first_order.language.is_algebraic_empty FirstOrder.Language.isAlgebraic_empty instance isRelational_sum [L.IsRelational] [L'.IsRelational] : IsRelational (L.sum L') := ⟨fun _ => instIsEmptySum⟩ #align first_order.language.is_relational_sum FirstOrder.Language.isRelational_sum instance isAlgebraic_sum [L.IsAlgebraic] [L'.IsAlgebraic] : IsAlgebraic (L.sum L') := ⟨fun _ => instIsEmptySum⟩ #align first_order.language.is_algebraic_sum FirstOrder.Language.isAlgebraic_sum instance isRelational_mk₂ {c f₁ f₂ : Type u} {r₁ r₂ : Type v} [h0 : IsEmpty c] [h1 : IsEmpty f₁] [h2 : IsEmpty f₂] : IsRelational (Language.mk₂ c f₁ f₂ r₁ r₂) := ⟨fun n => Nat.casesOn n h0 fun n => Nat.casesOn n h1 fun n => Nat.casesOn n h2 fun _ => inferInstanceAs (IsEmpty PEmpty)⟩ #align first_order.language.is_relational_mk₂ FirstOrder.Language.isRelational_mk₂ instance isAlgebraic_mk₂ {c f₁ f₂ : Type u} {r₁ r₂ : Type v} [h1 : IsEmpty r₁] [h2 : IsEmpty r₂] : IsAlgebraic (Language.mk₂ c f₁ f₂ r₁ r₂) := ⟨fun n => Nat.casesOn n (inferInstanceAs (IsEmpty PEmpty)) fun n => Nat.casesOn n h1 fun n => Nat.casesOn n h2 fun _ => inferInstanceAs (IsEmpty PEmpty)⟩ #align first_order.language.is_algebraic_mk₂ FirstOrder.Language.isAlgebraic_mk₂ instance subsingleton_mk₂_functions {c f₁ f₂ : Type u} {r₁ r₂ : Type v} [h0 : Subsingleton c] [h1 : Subsingleton f₁] [h2 : Subsingleton f₂] {n : ℕ} : Subsingleton ((Language.mk₂ c f₁ f₂ r₁ r₂).Functions n) := Nat.casesOn n h0 fun n => Nat.casesOn n h1 fun n => Nat.casesOn n h2 fun _ => ⟨fun x => PEmpty.elim x⟩ #align first_order.language.subsingleton_mk₂_functions FirstOrder.Language.subsingleton_mk₂_functions instance subsingleton_mk₂_relations {c f₁ f₂ : Type u} {r₁ r₂ : Type v} [h1 : Subsingleton r₁] [h2 : Subsingleton r₂] {n : ℕ} : Subsingleton ((Language.mk₂ c f₁ f₂ r₁ r₂).Relations n) := Nat.casesOn n ⟨fun x => PEmpty.elim x⟩ fun n => Nat.casesOn n h1 fun n => Nat.casesOn n h2 fun _ => ⟨fun x => PEmpty.elim x⟩ #align first_order.language.subsingleton_mk₂_relations FirstOrder.Language.subsingleton_mk₂_relations @[simp] theorem empty_card : Language.empty.card = 0 := by simp [card_eq_card_functions_add_card_relations] #align first_order.language.empty_card FirstOrder.Language.empty_card instance isEmpty_empty : IsEmpty Language.empty.Symbols := by simp only [Language.Symbols, isEmpty_sum, isEmpty_sigma] exact ⟨fun _ => inferInstance, fun _ => inferInstance⟩ #align first_order.language.is_empty_empty FirstOrder.Language.isEmpty_empty instance Countable.countable_functions [h : Countable L.Symbols] : Countable (Σl, L.Functions l) := @Function.Injective.countable _ _ h _ Sum.inl_injective #align first_order.language.countable.countable_functions FirstOrder.Language.Countable.countable_functions @[simp] theorem card_functions_sum (i : ℕ) : #((L.sum L').Functions i) = (Cardinal.lift.{u'} #(L.Functions i) + Cardinal.lift.{u} #(L'.Functions i) : Cardinal) := by simp [Language.sum] #align first_order.language.card_functions_sum FirstOrder.Language.card_functions_sum @[simp] theorem card_relations_sum (i : ℕ) : #((L.sum L').Relations i) = Cardinal.lift.{v'} #(L.Relations i) + Cardinal.lift.{v} #(L'.Relations i) := by simp [Language.sum] #align first_order.language.card_relations_sum FirstOrder.Language.card_relations_sum @[simp] theorem card_sum : (L.sum L').card = Cardinal.lift.{max u' v'} L.card + Cardinal.lift.{max u v} L'.card := by simp only [card_eq_card_functions_add_card_relations, card_functions_sum, card_relations_sum, sum_add_distrib', lift_add, lift_sum, lift_lift] simp only [add_assoc, add_comm (Cardinal.sum fun i => (#(L'.Functions i)).lift)] #align first_order.language.card_sum FirstOrder.Language.card_sum @[simp] theorem card_mk₂ (c f₁ f₂ : Type u) (r₁ r₂ : Type v) : (Language.mk₂ c f₁ f₂ r₁ r₂).card = Cardinal.lift.{v} #c + Cardinal.lift.{v} #f₁ + Cardinal.lift.{v} #f₂ + Cardinal.lift.{u} #r₁ + Cardinal.lift.{u} #r₂ := by simp [card_eq_card_functions_add_card_relations, add_assoc] #align first_order.language.card_mk₂ FirstOrder.Language.card_mk₂ variable (L) (M : Type w) @[ext] class Structure where funMap : ∀ {n}, L.Functions n → (Fin n → M) → M RelMap : ∀ {n}, L.Relations n → (Fin n → M) → Prop set_option linter.uppercaseLean3 false in #align first_order.language.Structure FirstOrder.Language.Structure set_option linter.uppercaseLean3 false in #align first_order.language.Structure.fun_map FirstOrder.Language.Structure.funMap set_option linter.uppercaseLean3 false in #align first_order.language.Structure.rel_map FirstOrder.Language.Structure.RelMap variable (N : Type w') [L.Structure M] [L.Structure N] open Structure def Inhabited.trivialStructure {α : Type} [Inhabited α] : L.Structure α := ⟨default, default⟩ #align first_order.language.inhabited.trivial_structure FirstOrder.Language.Inhabited.trivialStructure structure Hom where toFun : M → N -- Porting note: -- The autoparam here used to be `obviously`. We would like to replace it with `aesop` -- but that isn't currently sufficient. -- See https://leanprover.zulipchat.com/#narrow/stream/287929-mathlib4/topic/Aesop.20and.20cases -- If that can be improved, we should change this to `by aesop` and remove the proofs below. map_fun' : ∀ {n} (f : L.Functions n) (x), toFun (funMap f x) = funMap f (toFun ∘ x) := by intros; trivial map_rel' : ∀ {n} (r : L.Relations n) (x), RelMap r x → RelMap r (toFun ∘ x) := by -- Porting note: see porting note on `Hom.map_fun'` intros; trivial #align first_order.language.hom FirstOrder.Language.Hom @[inherit_doc] scoped[FirstOrder] notation:25 A " →[" L "] " B => FirstOrder.Language.Hom L A B structure Embedding extends M ↪ N where map_fun' : ∀ {n} (f : L.Functions n) (x), toFun (funMap f x) = funMap f (toFun ∘ x) := by -- Porting note: see porting note on `Hom.map_fun'` intros; trivial map_rel' : ∀ {n} (r : L.Relations n) (x), RelMap r (toFun ∘ x) ↔ RelMap r x := by -- Porting note: see porting note on `Hom.map_fun'` intros; trivial #align first_order.language.embedding FirstOrder.Language.Embedding @[inherit_doc] scoped[FirstOrder] notation:25 A " ↪[" L "] " B => FirstOrder.Language.Embedding L A B structure Equiv extends M ≃ N where map_fun' : ∀ {n} (f : L.Functions n) (x), toFun (funMap f x) = funMap f (toFun ∘ x) := by -- Porting note: see porting note on `Hom.map_fun'` intros; trivial map_rel' : ∀ {n} (r : L.Relations n) (x), RelMap r (toFun ∘ x) ↔ RelMap r x := by -- Porting note: see porting note on `Hom.map_fun'` intros; trivial #align first_order.language.equiv FirstOrder.Language.Equiv @[inherit_doc] scoped[FirstOrder] notation:25 A " ≃[" L "] " B => FirstOrder.Language.Equiv L A B -- Porting note: was [L.Structure P] and [L.Structure Q] -- The former reported an error. variable {L M N} {P : Type} [Structure L P] {Q : Type} [Structure L Q] -- Porting note (#11445): new definition @[coe] def constantMap (c : L.Constants) : M := funMap c default instance : CoeTC L.Constants M := ⟨constantMap⟩ theorem funMap_eq_coe_constants {c : L.Constants} {x : Fin 0 → M} : funMap c x = c := congr rfl (funext finZeroElim) #align first_order.language.fun_map_eq_coe_constants FirstOrder.Language.funMap_eq_coe_constants theorem nonempty_of_nonempty_constants [h : Nonempty L.Constants] : Nonempty M := h.map (↑) #align first_order.language.nonempty_of_nonempty_constants FirstOrder.Language.nonempty_of_nonempty_constants def funMap₂ {c f₁ f₂ : Type u} {r₁ r₂ : Type v} (c' : c → M) (f₁' : f₁ → M → M) (f₂' : f₂ → M → M → M) : ∀ {n}, (Language.mk₂ c f₁ f₂ r₁ r₂).Functions n → (Fin n → M) → M \| 0, f, _ => c' f \| 1, f, x => f₁' f (x 0) \| 2, f, x => f₂' f (x 0) (x 1) \| _ + 3, f, _ => PEmpty.elim f #align first_order.language.fun_map₂ FirstOrder.Language.funMap₂ def RelMap₂ {c f₁ f₂ : Type u} {r₁ r₂ : Type v} (r₁' : r₁ → Set M) (r₂' : r₂ → M → M → Prop) : ∀ {n}, (Language.mk₂ c f₁ f₂ r₁ r₂).Relations n → (Fin n → M) → Prop \| 0, r, _ => PEmpty.elim r \| 1, r, x => x 0 ∈ r₁' r \| 2, r, x => r₂' r (x 0) (x 1) \| _ + 3, r, _ => PEmpty.elim r #align first_order.language.rel_map₂ FirstOrder.Language.RelMap₂ protected def Structure.mk₂ {c f₁ f₂ : Type u} {r₁ r₂ : Type v} (c' : c → M) (f₁' : f₁ → M → M) (f₂' : f₂ → M → M → M) (r₁' : r₁ → Set M) (r₂' : r₂ → M → M → Prop) : (Language.mk₂ c f₁ f₂ r₁ r₂).Structure M := ⟨funMap₂ c' f₁' f₂', RelMap₂ r₁' r₂'⟩ set_option linter.uppercaseLean3 false in #align first_order.language.Structure.mk₂ FirstOrder.Language.Structure.mk₂ class HomClass (L : outParam Language) (F M N : Type) [FunLike F M N] [L.Structure M] [L.Structure N] : Prop where map_fun : ∀ (φ : F) {n} (f : L.Functions n) (x), φ (funMap f x) = funMap f (φ ∘ x) map_rel : ∀ (φ : F) {n} (r : L.Relations n) (x), RelMap r x → RelMap r (φ ∘ x) #align first_order.language.hom_class FirstOrder.Language.HomClass class StrongHomClass (L : outParam Language) (F M N : Type*) [FunLike F M N] [L.Structure M] [L.Structure N] : Prop where map_fun : ∀ (φ : F) {n} (f : L.Functions n) (x), φ (funMap f x) = funMap f (φ ∘ x) map_rel : ∀ (φ : F) {n} (r : L.Relations n) (x), RelMap r (φ ∘ x) ↔ RelMap r x #align first_order.language.strong_hom_class FirstOrder.Language.StrongHomClass -- Porting note: using implicit brackets for `Structure` arguments instance (priority := 100) StrongHomClass.homClass [L.Structure M] [L.Structure N] [FunLike F M N] [StrongHomClass L F M N] : HomClass L F M N where map_fun := StrongHomClass.map_fun map_rel φ _ R x := (StrongHomClass.map_rel φ R x).2 #align first_order.language.strong_hom_class.hom_class FirstOrder.Language.StrongHomClass.homClass theorem HomClass.strongHomClassOfIsAlgebraic [L.IsAlgebraic] {F M N} [L.Structure M] [L.Structure N] [FunLike F M N] [HomClass L F M N] : StrongHomClass L F M N where map_fun := HomClass.map_fun map_rel _ n R _ := (IsAlgebraic.empty_relations n).elim R #align first_order.language.hom_class.strong_hom_class_of_is_algebraic FirstOrder.Language.HomClass.strongHomClassOfIsAlgebraic theorem HomClass.map_constants {F M N} [L.Structure M] [L.Structure N] [FunLike F M N] [HomClass L F M N] (φ : F) (c : L.Constants) : φ c = c := (HomClass.map_fun φ c default).trans (congr rfl (funext default)) #align first_order.language.hom_class.map_constants FirstOrder.Language.HomClass.map_constants attribute [inherit_doc FirstOrder.Language.Hom.map_fun'] FirstOrder.Language.Embedding.map_fun' FirstOrder.Language.HomClass.map_fun FirstOrder.Language.StrongHomClass.map_fun FirstOrder.Language.Equiv.map_fun' attribute [inherit_doc FirstOrder.Language.Hom.map_rel'] FirstOrder.Language.Embedding.map_rel' FirstOrder.Language.HomClass.map_rel FirstOrder.Language.StrongHomClass.map_rel FirstOrder.Language.Equiv.map_rel' def HomClass.toHom {F M N} [L.Structure M] [L.Structure N] [FunLike F M N] [HomClass L F M N] : F → M →[L] N := fun φ => ⟨φ, HomClass.map_fun φ, HomClass.map_rel φ⟩ #align first_order.language.hom_class.to_hom FirstOrder.Language.HomClass.toHom def StrongHomClass.toEmbedding {F M N} [L.Structure M] [L.Structure N] [FunLike F M N] [EmbeddingLike F M N] [StrongHomClass L F M N] : F → M ↪[L] N := fun φ => ⟨⟨φ, EmbeddingLike.injective φ⟩, StrongHomClass.map_fun φ, StrongHomClass.map_rel φ⟩ #align first_order.language.strong_hom_class.to_embedding FirstOrder.Language.StrongHomClass.toEmbedding namespace Equiv instance : EquivLike (M ≃[L] N) M N where coe f := f.toFun inv f := f.invFun left_inv f := f.left_inv right_inv f := f.right_inv coe_injective' f g h₁ h₂ := by cases f cases g simp only [mk.injEq] ext x exact Function.funext_iff.1 h₁ x instance : StrongHomClass L (M ≃[L] N) M N where map_fun := map_fun' map_rel := map_rel' @[symm] def symm (f : M ≃[L] N) : N ≃[L] M := { f.toEquiv.symm with map_fun' := fun n f' {x} => by simp only [Equiv.toFun_as_coe] rw [Equiv.symm_apply_eq] refine Eq.trans ?_ (f.map_fun' f' (f.toEquiv.symm ∘ x)).symm rw [← Function.comp.assoc, Equiv.toFun_as_coe, Equiv.self_comp_symm, Function.id_comp] map_rel' := fun n r {x} => by simp only [Equiv.toFun_as_coe] refine (f.map_rel' r (f.toEquiv.symm ∘ x)).symm.trans ?_ rw [← Function.comp.assoc, Equiv.toFun_as_coe, Equiv.self_comp_symm, Function.id_comp] } #align first_order.language.equiv.symm FirstOrder.Language.Equiv.symm instance hasCoeToFun : CoeFun (M ≃[L] N) fun _ => M → N := DFunLike.hasCoeToFun #align first_order.language.equiv.has_coe_to_fun FirstOrder.Language.Equiv.hasCoeToFun @[simp] theorem symm_symm (f : M ≃[L] N) : f.symm.symm = f := rfl @[simp] theorem apply_symm_apply (f : M ≃[L] N) (a : N) : f (f.symm a) = a := f.toEquiv.apply_symm_apply a #align first_order.language.equiv.apply_symm_apply FirstOrder.Language.Equiv.apply_symm_apply @[simp] theorem symm_apply_apply (f : M ≃[L] N) (a : M) : f.symm (f a) = a := f.toEquiv.symm_apply_apply a #align first_order.language.equiv.symm_apply_apply FirstOrder.Language.Equiv.symm_apply_apply @[simp] theorem map_fun (φ : M ≃[L] N) {n : ℕ} (f : L.Functions n) (x : Fin n → M) : φ (funMap f x) = funMap f (φ ∘ x) := HomClass.map_fun φ f x #align first_order.language.equiv.map_fun FirstOrder.Language.Equiv.map_fun @[simp] theorem map_constants (φ : M ≃[L] N) (c : L.Constants) : φ c = c := HomClass.map_constants φ c #align first_order.language.equiv.map_constants FirstOrder.Language.Equiv.map_constants @[simp] theorem map_rel (φ : M ≃[L] N) {n : ℕ} (r : L.Relations n) (x : Fin n → M) : RelMap r (φ ∘ x) ↔ RelMap r x := StrongHomClass.map_rel φ r x #align first_order.language.equiv.map_rel FirstOrder.Language.Equiv.map_rel def toEmbedding : (M ≃[L] N) → M ↪[L] N := StrongHomClass.toEmbedding #align first_order.language.equiv.to_embedding FirstOrder.Language.Equiv.toEmbedding def toHom : (M ≃[L] N) → M →[L] N := HomClass.toHom #align first_order.language.equiv.to_hom FirstOrder.Language.Equiv.toHom @[simp] theorem toEmbedding_toHom (f : M ≃[L] N) : f.toEmbedding.toHom = f.toHom := rfl #align first_order.language.equiv.to_embedding_to_hom FirstOrder.Language.Equiv.toEmbedding_toHom @[simp] theorem coe_toHom {f : M ≃[L] N} : (f.toHom : M → N) = (f : M → N) := rfl #align first_order.language.equiv.coe_to_hom FirstOrder.Language.Equiv.coe_toHom @[simp] theorem coe_toEmbedding (f : M ≃[L] N) : (f.toEmbedding : M → N) = (f : M → N) := rfl #align first_order.language.equiv.coe_to_embedding FirstOrder.Language.Equiv.coe_toEmbedding theorem injective_toEmbedding : Function.Injective (toEmbedding : (M ≃[L] N) → M ↪[L] N) := by intro _ _ h; apply DFunLike.coe_injective; exact congr_arg (DFunLike.coe ∘ Embedding.toHom) h theorem coe_injective : @Function.Injective (M ≃[L] N) (M → N) (↑) := DFunLike.coe_injective #align first_order.language.equiv.coe_injective FirstOrder.Language.Equiv.coe_injective @[ext] theorem ext ⦃f g : M ≃[L] N⦄ (h : ∀ x, f x = g x) : f = g := coe_injective (funext h) #align first_order.language.equiv.ext FirstOrder.Language.Equiv.ext theorem ext_iff {f g : M ≃[L] N} : f = g ↔ ∀ x, f x = g x := ⟨fun h _ => h ▸ rfl, fun h => ext h⟩ #align first_order.language.equiv.ext_iff FirstOrder.Language.Equiv.ext_iff theorem bijective (f : M ≃[L] N) : Function.Bijective f := EquivLike.bijective f #align first_order.language.equiv.bijective FirstOrder.Language.Equiv.bijective theorem injective (f : M ≃[L] N) : Function.Injective f := EquivLike.injective f #align first_order.language.equiv.injective FirstOrder.Language.Equiv.injective theorem surjective (f : M ≃[L] N) : Function.Surjective f := EquivLike.surjective f #align first_order.language.equiv.surjective FirstOrder.Language.Equiv.surjective variable (L) (M) @[refl] def refl : M ≃[L] M where toEquiv := _root_.Equiv.refl M #align first_order.language.equiv.refl FirstOrder.Language.Equiv.refl variable {L} {M} instance : Inhabited (M ≃[L] M) := ⟨refl L M⟩ @[simp] theorem refl_apply (x : M) : refl L M x = x := by simp [refl]; rfl #align first_order.language.equiv.refl_apply FirstOrder.Language.Equiv.refl_apply @[trans] def comp (hnp : N ≃[L] P) (hmn : M ≃[L] N) : M ≃[L] P := { hmn.toEquiv.trans hnp.toEquiv with toFun := hnp ∘ hmn -- Porting note: should be done by autoparam? map_fun' := by intros; simp only [Function.comp_apply, map_fun]; trivial -- Porting note: should be done by autoparam? map_rel' := by intros; rw [Function.comp.assoc, map_rel, map_rel] } #align first_order.language.equiv.comp FirstOrder.Language.Equiv.comp @[simp] theorem comp_apply (g : N ≃[L] P) (f : M ≃[L] N) (x : M) : g.comp f x = g (f x) := rfl #align first_order.language.equiv.comp_apply FirstOrder.Language.Equiv.comp_apply @[simp] theorem comp_refl (g : M ≃[L] N) : g.comp (refl L M) = g := rfl @[simp] theorem refl_comp (g : M ≃[L] N) : (refl L N).comp g = g := rfl @[simp] theorem refl_toEmbedding : (refl L M).toEmbedding = Embedding.refl L M := rfl @[simp] theorem refl_toHom : (refl L M).toHom = Hom.id L M := rfl theorem comp_assoc (f : M ≃[L] N) (g : N ≃[L] P) (h : P ≃[L] Q) : (h.comp g).comp f = h.comp (g.comp f) := rfl #align first_order.language.equiv.comp_assoc FirstOrder.Language.Equiv.comp_assoc theorem injective_comp (h : N ≃[L] P) : Function.Injective (h.comp : (M ≃[L] N) → (M ≃[L] P)) := by intro f g hfg ext x; exact h.injective (congr_fun (congr_arg DFunLike.coe hfg) x) @[simp] theorem comp_toHom (hnp : N ≃[L] P) (hmn : M ≃[L] N) : (hnp.comp hmn).toHom = hnp.toHom.comp hmn.toHom := rfl @[simp] theorem comp_toEmbedding (hnp : N ≃[L] P) (hmn : M ≃[L] N) : (hnp.comp hmn).toEmbedding = hnp.toEmbedding.comp hmn.toEmbedding := rfl @[simp] theorem self_comp_symm (f : M ≃[L] N) : f.comp f.symm = refl L N := by ext; rw [comp_apply, apply_symm_apply, refl_apply] @[simp] theorem symm_comp_self (f : M ≃[L] N) : f.symm.comp f = refl L M := by ext; rw [comp_apply, symm_apply_apply, refl_apply] @[simp] theorem symm_comp_self_toEmbedding (f : M ≃[L] N) : f.symm.toEmbedding.comp f.toEmbedding = Embedding.refl L M := by rw [← comp_toEmbedding, symm_comp_self, refl_toEmbedding] @[simp] theorem self_comp_symm_toEmbedding (f : M ≃[L] N) : f.toEmbedding.comp f.symm.toEmbedding = Embedding.refl L N := by rw [← comp_toEmbedding, self_comp_symm, refl_toEmbedding] @[simp] theorem symm_comp_self_toHom (f : M ≃[L] N) : f.symm.toHom.comp f.toHom = Hom.id L M := by rw [← comp_toHom, symm_comp_self, refl_toHom] @[simp]	Mathlib/ModelTheory/Basic.lean	999	1,001	theorem self_comp_symm_toHom (f : M ≃[L] N) : f.toHom.comp f.symm.toHom = Hom.id L N := by	rw [← comp_toHom, self_comp_symm, refl_toHom]
import Mathlib.Data.ENat.Lattice import Mathlib.Order.OrderIsoNat import Mathlib.Tactic.TFAE #align_import order.height from "leanprover-community/mathlib"@"bf27744463e9620ca4e4ebe951fe83530ae6949b" open List hiding le_antisymm open OrderDual universe u v variable {α β : Type*} namespace Set section Preorder variable (s t : Set α) [Preorder α] theorem chainHeight_eq_iSup_Ici : s.chainHeight = ⨆ i ∈ s, (s ∩ Set.Ici i).chainHeight := by apply le_antisymm · refine iSup₂_le ?_ rintro (_ \| ⟨x, xs⟩) h · exact zero_le _ · apply le_trans _ (le_iSup₂ x (cons_mem_subchain_iff.mp h).1) apply length_le_chainHeight_of_mem_subchain refine ⟨h.1, fun i hi ↦ ⟨h.2 i hi, ?_⟩⟩ cases hi · exact left_mem_Ici rename_i hi cases' chain'_iff_pairwise.mp h.1 with _ _ h' exact (h' _ hi).le · exact iSup₂_le fun i _ ↦ chainHeight_mono Set.inter_subset_left #align set.chain_height_eq_supr_Ici Set.chainHeight_eq_iSup_Ici theorem chainHeight_eq_iSup_Iic : s.chainHeight = ⨆ i ∈ s, (s ∩ Set.Iic i).chainHeight := by simp_rw [← chainHeight_dual (_ ∩ _)] rw [← chainHeight_dual, chainHeight_eq_iSup_Ici] rfl #align set.chain_height_eq_supr_Iic Set.chainHeight_eq_iSup_Iic variable {s t} theorem chainHeight_insert_of_forall_gt (a : α) (hx : ∀ b ∈ s, a < b) : (insert a s).chainHeight = s.chainHeight + 1 := by rw [← add_zero (insert a s).chainHeight] change (insert a s).chainHeight + (0 : ℕ) = s.chainHeight + (1 : ℕ) apply le_antisymm <;> rw [chainHeight_add_le_chainHeight_add] · rintro (_ \| ⟨y, ys⟩) h · exact ⟨[], nil_mem_subchain _, zero_le _⟩ · have h' := cons_mem_subchain_iff.mp h refine ⟨ys, ⟨h'.2.1.1, fun i hi ↦ ?_⟩, by simp⟩ apply (h'.2.1.2 i hi).resolve_left rintro rfl cases' chain'_iff_pairwise.mp h.1 with _ _ hy cases' h'.1 with h' h' exacts [(hy _ hi).ne h', not_le_of_gt (hy _ hi) (hx _ h').le] · intro l hl refine ⟨a::l, ⟨?_, ?_⟩, by simp⟩ · rw [chain'_cons'] exact ⟨fun y hy ↦ hx _ (hl.2 _ (mem_of_mem_head? hy)), hl.1⟩ · -- Porting note: originally this was -- rintro x (rfl \| hx) -- exacts [Or.inl (Set.mem_singleton x), Or.inr (hl.2 x hx)] -- but this fails because `List.Mem` is now an inductive prop. -- I couldn't work out how to drive `rcases` here but asked at -- https://leanprover.zulipchat.com/#narrow/stream/348111-std4/topic/rcases.3F/near/347976083 rintro x (_ \| _) exacts [Or.inl (Set.mem_singleton a), Or.inr (hl.2 x ‹_›)] #align set.chain_height_insert_of_forall_gt Set.chainHeight_insert_of_forall_gt theorem chainHeight_insert_of_forall_lt (a : α) (ha : ∀ b ∈ s, b < a) : (insert a s).chainHeight = s.chainHeight + 1 := by rw [← chainHeight_dual, ← chainHeight_dual s] exact chainHeight_insert_of_forall_gt _ ha #align set.chain_height_insert_of_forall_lt Set.chainHeight_insert_of_forall_lt theorem chainHeight_union_le : (s ∪ t).chainHeight ≤ s.chainHeight + t.chainHeight := by classical refine iSup₂_le fun l hl ↦ ?_ let l₁ := l.filter (· ∈ s) let l₂ := l.filter (· ∈ t) have hl₁ : ↑l₁.length ≤ s.chainHeight := by apply Set.length_le_chainHeight_of_mem_subchain exact ⟨hl.1.sublist (filter_sublist _), fun i h ↦ by simpa using (of_mem_filter h : _)⟩ have hl₂ : ↑l₂.length ≤ t.chainHeight := by apply Set.length_le_chainHeight_of_mem_subchain exact ⟨hl.1.sublist (filter_sublist _), fun i h ↦ by simpa using (of_mem_filter h : _)⟩ refine le_trans ?_ (add_le_add hl₁ hl₂) simp_rw [l₁, l₂, ← Nat.cast_add, ← Multiset.coe_card, ← Multiset.card_add, ← Multiset.filter_coe] rw [Multiset.filter_add_filter, Multiset.filter_eq_self.mpr, Multiset.card_add, Nat.cast_add] exacts [le_add_right rfl.le, hl.2] #align set.chain_height_union_le Set.chainHeight_union_le	Mathlib/Order/Height.lean	333	349	theorem chainHeight_union_eq (s t : Set α) (H : ∀ a ∈ s, ∀ b ∈ t, a < b) : (s ∪ t).chainHeight = s.chainHeight + t.chainHeight := by	cases h : t.chainHeight · rw [add_top, eq_top_iff, ← h] exact Set.chainHeight_mono subset_union_right apply le_antisymm · rw [← h] exact chainHeight_union_le rw [← add_zero (s ∪ t).chainHeight, ← WithTop.coe_zero, ENat.some_eq_coe, chainHeight_add_le_chainHeight_add] intro l hl obtain ⟨l', hl', rfl⟩ := exists_chain_of_le_chainHeight t h.symm.le refine ⟨l ++ l', ⟨Chain'.append hl.1 hl'.1 fun x hx y hy ↦ ?_, fun i hi ↦ ?_⟩, by simp⟩ · exact H x (hl.2 _ <\| mem_of_mem_getLast? hx) y (hl'.2 _ <\| mem_of_mem_head? hy) · rw [mem_append] at hi cases' hi with hi hi exacts [Or.inl (hl.2 _ hi), Or.inr (hl'.2 _ hi)]
import Batteries.Control.ForInStep.Lemmas import Batteries.Data.List.Basic import Batteries.Tactic.Init import Batteries.Tactic.Alias namespace List open Nat @[simp] theorem mem_toArray {a : α} {l : List α} : a ∈ l.toArray ↔ a ∈ l := by simp [Array.mem_def] @[simp] theorem drop_one : ∀ l : List α, drop 1 l = tail l \| [] \| _ :: _ => rfl theorem zipWith_distrib_tail : (zipWith f l l').tail = zipWith f l.tail l'.tail := by rw [← drop_one]; simp [zipWith_distrib_drop] theorem subset_def {l₁ l₂ : List α} : l₁ ⊆ l₂ ↔ ∀ {a : α}, a ∈ l₁ → a ∈ l₂ := .rfl @[simp] theorem nil_subset (l : List α) : [] ⊆ l := nofun @[simp] theorem Subset.refl (l : List α) : l ⊆ l := fun _ i => i theorem Subset.trans {l₁ l₂ l₃ : List α} (h₁ : l₁ ⊆ l₂) (h₂ : l₂ ⊆ l₃) : l₁ ⊆ l₃ := fun _ i => h₂ (h₁ i) instance : Trans (Membership.mem : α → List α → Prop) Subset Membership.mem := ⟨fun h₁ h₂ => h₂ h₁⟩ instance : Trans (Subset : List α → List α → Prop) Subset Subset := ⟨Subset.trans⟩ @[simp] theorem subset_cons (a : α) (l : List α) : l ⊆ a :: l := fun _ => Mem.tail _ theorem subset_of_cons_subset {a : α} {l₁ l₂ : List α} : a :: l₁ ⊆ l₂ → l₁ ⊆ l₂ := fun s _ i => s (mem_cons_of_mem _ i) theorem subset_cons_of_subset (a : α) {l₁ l₂ : List α} : l₁ ⊆ l₂ → l₁ ⊆ a :: l₂ := fun s _ i => .tail _ (s i) theorem cons_subset_cons {l₁ l₂ : List α} (a : α) (s : l₁ ⊆ l₂) : a :: l₁ ⊆ a :: l₂ := fun _ => by simp only [mem_cons]; exact Or.imp_right (@s _) @[simp] theorem subset_append_left (l₁ l₂ : List α) : l₁ ⊆ l₁ ++ l₂ := fun _ => mem_append_left _ @[simp] theorem subset_append_right (l₁ l₂ : List α) : l₂ ⊆ l₁ ++ l₂ := fun _ => mem_append_right _ theorem subset_append_of_subset_left (l₂ : List α) : l ⊆ l₁ → l ⊆ l₁ ++ l₂ := fun s => Subset.trans s <\| subset_append_left _ _ theorem subset_append_of_subset_right (l₁ : List α) : l ⊆ l₂ → l ⊆ l₁ ++ l₂ := fun s => Subset.trans s <\| subset_append_right _ _ @[simp] theorem cons_subset : a :: l ⊆ m ↔ a ∈ m ∧ l ⊆ m := by simp only [subset_def, mem_cons, or_imp, forall_and, forall_eq] @[simp] theorem append_subset {l₁ l₂ l : List α} : l₁ ++ l₂ ⊆ l ↔ l₁ ⊆ l ∧ l₂ ⊆ l := by simp [subset_def, or_imp, forall_and] theorem subset_nil {l : List α} : l ⊆ [] ↔ l = [] := ⟨fun h => match l with \| [] => rfl \| _::_ => (nomatch h (.head ..)), fun \| rfl => Subset.refl _⟩ theorem map_subset {l₁ l₂ : List α} (f : α → β) (H : l₁ ⊆ l₂) : map f l₁ ⊆ map f l₂ := fun x => by simp only [mem_map]; exact .imp fun a => .imp_left (@H _) @[simp] theorem nil_sublist : ∀ l : List α, [] <+ l \| [] => .slnil \| a :: l => (nil_sublist l).cons a @[simp] theorem Sublist.refl : ∀ l : List α, l <+ l \| [] => .slnil \| a :: l => (Sublist.refl l).cons₂ a theorem Sublist.trans {l₁ l₂ l₃ : List α} (h₁ : l₁ <+ l₂) (h₂ : l₂ <+ l₃) : l₁ <+ l₃ := by induction h₂ generalizing l₁ with \| slnil => exact h₁ \| cons _ _ IH => exact (IH h₁).cons _ \| @cons₂ l₂ _ a _ IH => generalize e : a :: l₂ = l₂' match e ▸ h₁ with \| .slnil => apply nil_sublist \| .cons a' h₁' => cases e; apply (IH h₁').cons \| .cons₂ a' h₁' => cases e; apply (IH h₁').cons₂ instance : Trans (@Sublist α) Sublist Sublist := ⟨Sublist.trans⟩ @[simp] theorem sublist_cons (a : α) (l : List α) : l <+ a :: l := (Sublist.refl l).cons _ theorem sublist_of_cons_sublist : a :: l₁ <+ l₂ → l₁ <+ l₂ := (sublist_cons a l₁).trans @[simp] theorem sublist_append_left : ∀ l₁ l₂ : List α, l₁ <+ l₁ ++ l₂ \| [], _ => nil_sublist _ \| _ :: l₁, l₂ => (sublist_append_left l₁ l₂).cons₂ _ @[simp] theorem sublist_append_right : ∀ l₁ l₂ : List α, l₂ <+ l₁ ++ l₂ \| [], _ => Sublist.refl _ \| _ :: l₁, l₂ => (sublist_append_right l₁ l₂).cons _ theorem sublist_append_of_sublist_left (s : l <+ l₁) : l <+ l₁ ++ l₂ := s.trans <\| sublist_append_left .. theorem sublist_append_of_sublist_right (s : l <+ l₂) : l <+ l₁ ++ l₂ := s.trans <\| sublist_append_right .. @[simp] theorem cons_sublist_cons : a :: l₁ <+ a :: l₂ ↔ l₁ <+ l₂ := ⟨fun \| .cons _ s => sublist_of_cons_sublist s \| .cons₂ _ s => s, .cons₂ _⟩ @[simp] theorem append_sublist_append_left : ∀ l, l ++ l₁ <+ l ++ l₂ ↔ l₁ <+ l₂ \| [] => Iff.rfl \| _ :: l => cons_sublist_cons.trans (append_sublist_append_left l) theorem Sublist.append_left : l₁ <+ l₂ → ∀ l, l ++ l₁ <+ l ++ l₂ := fun h l => (append_sublist_append_left l).mpr h theorem Sublist.append_right : l₁ <+ l₂ → ∀ l, l₁ ++ l <+ l₂ ++ l \| .slnil, _ => Sublist.refl _ \| .cons _ h, _ => (h.append_right _).cons _ \| .cons₂ _ h, _ => (h.append_right _).cons₂ _ theorem sublist_or_mem_of_sublist (h : l <+ l₁ ++ a :: l₂) : l <+ l₁ ++ l₂ ∨ a ∈ l := by induction l₁ generalizing l with \| nil => match h with \| .cons _ h => exact .inl h \| .cons₂ _ h => exact .inr (.head ..) \| cons b l₁ IH => match h with \| .cons _ h => exact (IH h).imp_left (Sublist.cons _) \| .cons₂ _ h => exact (IH h).imp (Sublist.cons₂ _) (.tail _) theorem Sublist.reverse : l₁ <+ l₂ → l₁.reverse <+ l₂.reverse \| .slnil => Sublist.refl _ \| .cons _ h => by rw [reverse_cons]; exact sublist_append_of_sublist_left h.reverse \| .cons₂ _ h => by rw [reverse_cons, reverse_cons]; exact h.reverse.append_right _ @[simp] theorem reverse_sublist : l₁.reverse <+ l₂.reverse ↔ l₁ <+ l₂ := ⟨fun h => l₁.reverse_reverse ▸ l₂.reverse_reverse ▸ h.reverse, Sublist.reverse⟩ @[simp] theorem append_sublist_append_right (l) : l₁ ++ l <+ l₂ ++ l ↔ l₁ <+ l₂ := ⟨fun h => by have := h.reverse simp only [reverse_append, append_sublist_append_left, reverse_sublist] at this exact this, fun h => h.append_right l⟩ theorem Sublist.append (hl : l₁ <+ l₂) (hr : r₁ <+ r₂) : l₁ ++ r₁ <+ l₂ ++ r₂ := (hl.append_right _).trans ((append_sublist_append_left _).2 hr) theorem Sublist.subset : l₁ <+ l₂ → l₁ ⊆ l₂ \| .slnil, _, h => h \| .cons _ s, _, h => .tail _ (s.subset h) \| .cons₂ .., _, .head .. => .head .. \| .cons₂ _ s, _, .tail _ h => .tail _ (s.subset h) instance : Trans (@Sublist α) Subset Subset := ⟨fun h₁ h₂ => trans h₁.subset h₂⟩ instance : Trans Subset (@Sublist α) Subset := ⟨fun h₁ h₂ => trans h₁ h₂.subset⟩ instance : Trans (Membership.mem : α → List α → Prop) Sublist Membership.mem := ⟨fun h₁ h₂ => h₂.subset h₁⟩ theorem Sublist.length_le : l₁ <+ l₂ → length l₁ ≤ length l₂ \| .slnil => Nat.le_refl 0 \| .cons _l s => le_succ_of_le (length_le s) \| .cons₂ _ s => succ_le_succ (length_le s) @[simp] theorem sublist_nil {l : List α} : l <+ [] ↔ l = [] := ⟨fun s => subset_nil.1 s.subset, fun H => H ▸ Sublist.refl _⟩ theorem Sublist.eq_of_length : l₁ <+ l₂ → length l₁ = length l₂ → l₁ = l₂ \| .slnil, _ => rfl \| .cons a s, h => nomatch Nat.not_lt.2 s.length_le (h ▸ lt_succ_self _) \| .cons₂ a s, h => by rw [s.eq_of_length (succ.inj h)] theorem Sublist.eq_of_length_le (s : l₁ <+ l₂) (h : length l₂ ≤ length l₁) : l₁ = l₂ := s.eq_of_length <\| Nat.le_antisymm s.length_le h @[simp] theorem singleton_sublist {a : α} {l} : [a] <+ l ↔ a ∈ l := by refine ⟨fun h => h.subset (mem_singleton_self _), fun h => ?_⟩ obtain ⟨_, _, rfl⟩ := append_of_mem h exact ((nil_sublist _).cons₂ _).trans (sublist_append_right ..) @[simp] theorem replicate_sublist_replicate {m n} (a : α) : replicate m a <+ replicate n a ↔ m ≤ n := by refine ⟨fun h => ?_, fun h => ?_⟩ · have := h.length_le; simp only [length_replicate] at this ⊢; exact this · induction h with \| refl => apply Sublist.refl \| step => simp [, replicate, Sublist.cons] theorem isSublist_iff_sublist [BEq α] [LawfulBEq α] {l₁ l₂ : List α} : l₁.isSublist l₂ ↔ l₁ <+ l₂ := by cases l₁ <;> cases l₂ <;> simp [isSublist] case cons.cons hd₁ tl₁ hd₂ tl₂ => if h_eq : hd₁ = hd₂ then simp [h_eq, cons_sublist_cons, isSublist_iff_sublist] else simp only [beq_iff_eq, h_eq] constructor · intro h_sub apply Sublist.cons exact isSublist_iff_sublist.mp h_sub · intro h_sub cases h_sub case cons h_sub => exact isSublist_iff_sublist.mpr h_sub case cons₂ => contradiction instance [DecidableEq α] (l₁ l₂ : List α) : Decidable (l₁ <+ l₂) := decidable_of_iff (l₁.isSublist l₂) isSublist_iff_sublist theorem tail_eq_tailD (l) : @tail α l = tailD l [] := by cases l <;> rfl theorem tail_eq_tail? (l) : @tail α l = (tail? l).getD [] := by simp [tail_eq_tailD] @[simp] theorem next?_nil : @next? α [] = none := rfl @[simp] theorem next?_cons (a l) : @next? α (a :: l) = some (a, l) := rfl theorem get_eq_iff : List.get l n = x ↔ l.get? n.1 = some x := by simp [get?_eq_some] theorem get?_inj (h₀ : i < xs.length) (h₁ : Nodup xs) (h₂ : xs.get? i = xs.get? j) : i = j := by induction xs generalizing i j with \| nil => cases h₀ \| cons x xs ih => match i, j with \| 0, 0 => rfl \| i+1, j+1 => simp; cases h₁ with \| cons ha h₁ => exact ih (Nat.lt_of_succ_lt_succ h₀) h₁ h₂ \| i+1, 0 => ?_ \| 0, j+1 => ?_ all_goals simp at h₂ cases h₁; rename_i h' h have := h x ?_ rfl; cases this rw [mem_iff_get?] exact ⟨_, h₂⟩; exact ⟨_ , h₂.symm⟩ theorem tail_drop (l : List α) (n : Nat) : (l.drop n).tail = l.drop (n + 1) := by induction l generalizing n with \| nil => simp \| cons hd tl hl => cases n · simp · simp [hl] @[simp] theorem modifyNth_nil (f : α → α) (n) : [].modifyNth f n = [] := by cases n <;> rfl @[simp] theorem modifyNth_zero_cons (f : α → α) (a : α) (l : List α) : (a :: l).modifyNth f 0 = f a :: l := rfl @[simp] theorem modifyNth_succ_cons (f : α → α) (a : α) (l : List α) (n) : (a :: l).modifyNth f (n + 1) = a :: l.modifyNth f n := by rfl theorem modifyNthTail_id : ∀ n (l : List α), l.modifyNthTail id n = l \| 0, _ => rfl \| _+1, [] => rfl \| n+1, a :: l => congrArg (cons a) (modifyNthTail_id n l) theorem eraseIdx_eq_modifyNthTail : ∀ n (l : List α), eraseIdx l n = modifyNthTail tail n l \| 0, l => by cases l <;> rfl \| n+1, [] => rfl \| n+1, a :: l => congrArg (cons _) (eraseIdx_eq_modifyNthTail _ _) @[deprecated] alias removeNth_eq_nth_tail := eraseIdx_eq_modifyNthTail theorem get?_modifyNth (f : α → α) : ∀ n (l : List α) m, (modifyNth f n l).get? m = (fun a => if n = m then f a else a) <$> l.get? m \| n, l, 0 => by cases l <;> cases n <;> rfl \| n, [], _+1 => by cases n <;> rfl \| 0, _ :: l, m+1 => by cases h : l.get? m <;> simp [h, modifyNth, m.succ_ne_zero.symm] \| n+1, a :: l, m+1 => (get?_modifyNth f n l m).trans <\| by cases h' : l.get? m <;> by_cases h : n = m <;> simp [h, if_pos, if_neg, Option.map, mt Nat.succ.inj, not_false_iff, h'] theorem modifyNthTail_length (f : List α → List α) (H : ∀ l, length (f l) = length l) : ∀ n l, length (modifyNthTail f n l) = length l \| 0, _ => H _ \| _+1, [] => rfl \| _+1, _ :: _ => congrArg (·+1) (modifyNthTail_length _ H _ _) theorem modifyNthTail_add (f : List α → List α) (n) (l₁ l₂ : List α) : modifyNthTail f (l₁.length + n) (l₁ ++ l₂) = l₁ ++ modifyNthTail f n l₂ := by induction l₁ <;> simp [, Nat.succ_add] theorem exists_of_modifyNthTail (f : List α → List α) {n} {l : List α} (h : n ≤ l.length) : ∃ l₁ l₂, l = l₁ ++ l₂ ∧ l₁.length = n ∧ modifyNthTail f n l = l₁ ++ f l₂ := have ⟨_, _, eq, hl⟩ : ∃ l₁ l₂, l = l₁ ++ l₂ ∧ l₁.length = n := ⟨_, _, (take_append_drop n l).symm, length_take_of_le h⟩ ⟨_, _, eq, hl, hl ▸ eq ▸ modifyNthTail_add (n := 0) ..⟩ @[simp] theorem modify_get?_length (f : α → α) : ∀ n l, length (modifyNth f n l) = length l := modifyNthTail_length _ fun l => by cases l <;> rfl @[simp] theorem get?_modifyNth_eq (f : α → α) (n) (l : List α) : (modifyNth f n l).get? n = f <$> l.get? n := by simp only [get?_modifyNth, if_pos] @[simp] theorem get?_modifyNth_ne (f : α → α) {m n} (l : List α) (h : m ≠ n) : (modifyNth f m l).get? n = l.get? n := by simp only [get?_modifyNth, if_neg h, id_map'] theorem exists_of_modifyNth (f : α → α) {n} {l : List α} (h : n < l.length) : ∃ l₁ a l₂, l = l₁ ++ a :: l₂ ∧ l₁.length = n ∧ modifyNth f n l = l₁ ++ f a :: l₂ := match exists_of_modifyNthTail _ (Nat.le_of_lt h) with \| ⟨_, _::_, eq, hl, H⟩ => ⟨_, _, _, eq, hl, H⟩ \| ⟨_, [], eq, hl, _⟩ => nomatch Nat.ne_of_gt h (eq ▸ append_nil _ ▸ hl) theorem modifyNthTail_eq_take_drop (f : List α → List α) (H : f [] = []) : ∀ n l, modifyNthTail f n l = take n l ++ f (drop n l) \| 0, _ => rfl \| _ + 1, [] => H.symm \| n + 1, b :: l => congrArg (cons b) (modifyNthTail_eq_take_drop f H n l) theorem modifyNth_eq_take_drop (f : α → α) : ∀ n l, modifyNth f n l = take n l ++ modifyHead f (drop n l) := modifyNthTail_eq_take_drop _ rfl theorem modifyNth_eq_take_cons_drop (f : α → α) {n l} (h) : modifyNth f n l = take n l ++ f (get l ⟨n, h⟩) :: drop (n + 1) l := by rw [modifyNth_eq_take_drop, drop_eq_get_cons h]; rfl theorem set_eq_modifyNth (a : α) : ∀ n (l : List α), set l n a = modifyNth (fun _ => a) n l \| 0, l => by cases l <;> rfl \| n+1, [] => rfl \| n+1, b :: l => congrArg (cons _) (set_eq_modifyNth _ _ _) theorem set_eq_take_cons_drop (a : α) {n l} (h : n < length l) : set l n a = take n l ++ a :: drop (n + 1) l := by rw [set_eq_modifyNth, modifyNth_eq_take_cons_drop _ h] theorem modifyNth_eq_set_get? (f : α → α) : ∀ n (l : List α), l.modifyNth f n = ((fun a => l.set n (f a)) <$> l.get? n).getD l \| 0, l => by cases l <;> rfl \| n+1, [] => rfl \| n+1, b :: l => (congrArg (cons _) (modifyNth_eq_set_get? ..)).trans <\| by cases h : l.get? n <;> simp [h] theorem modifyNth_eq_set_get (f : α → α) {n} {l : List α} (h) : l.modifyNth f n = l.set n (f (l.get ⟨n, h⟩)) := by rw [modifyNth_eq_set_get?, get?_eq_get h]; rfl theorem exists_of_set {l : List α} (h : n < l.length) : ∃ l₁ a l₂, l = l₁ ++ a :: l₂ ∧ l₁.length = n ∧ l.set n a' = l₁ ++ a' :: l₂ := by rw [set_eq_modifyNth]; exact exists_of_modifyNth _ h theorem exists_of_set' {l : List α} (h : n < l.length) : ∃ l₁ l₂, l = l₁ ++ l.get ⟨n, h⟩ :: l₂ ∧ l₁.length = n ∧ l.set n a' = l₁ ++ a' :: l₂ := have ⟨_, _, _, h₁, h₂, h₃⟩ := exists_of_set h; ⟨_, _, get_of_append h₁ h₂ ▸ h₁, h₂, h₃⟩ @[simp] theorem get?_set_eq (a : α) (n) (l : List α) : (set l n a).get? n = (fun _ => a) <$> l.get? n := by simp only [set_eq_modifyNth, get?_modifyNth_eq] theorem get?_set_eq_of_lt (a : α) {n} {l : List α} (h : n < length l) : (set l n a).get? n = some a := by rw [get?_set_eq, get?_eq_get h]; rfl @[simp] theorem get?_set_ne (a : α) {m n} (l : List α) (h : m ≠ n) : (set l m a).get? n = l.get? n := by simp only [set_eq_modifyNth, get?_modifyNth_ne _ _ h] theorem get?_set (a : α) {m n} (l : List α) : (set l m a).get? n = if m = n then (fun _ => a) <$> l.get? n else l.get? n := by by_cases m = n <;> simp [, get?_set_eq, get?_set_ne] theorem get?_set_of_lt (a : α) {m n} (l : List α) (h : n < length l) : (set l m a).get? n = if m = n then some a else l.get? n := by simp [get?_set, get?_eq_get h] theorem get?_set_of_lt' (a : α) {m n} (l : List α) (h : m < length l) : (set l m a).get? n = if m = n then some a else l.get? n := by simp [get?_set]; split <;> subst_vars <;> simp [, get?_eq_get h] theorem drop_set_of_lt (a : α) {n m : Nat} (l : List α) (h : n < m) : (l.set n a).drop m = l.drop m := List.ext fun i => by rw [get?_drop, get?_drop, get?_set_ne _ _ (by omega)] theorem take_set_of_lt (a : α) {n m : Nat} (l : List α) (h : m < n) : (l.set n a).take m = l.take m := List.ext fun i => by rw [get?_take_eq_if, get?_take_eq_if] split · next h' => rw [get?_set_ne _ _ (by omega)] · rfl theorem length_eraseIdx : ∀ {l i}, i < length l → length (@eraseIdx α l i) = length l - 1 \| [], _, _ => rfl \| _::_, 0, _ => by simp [eraseIdx] \| x::xs, i+1, h => by have : i < length xs := Nat.lt_of_succ_lt_succ h simp [eraseIdx, ← Nat.add_one] rw [length_eraseIdx this, Nat.sub_add_cancel (Nat.lt_of_le_of_lt (Nat.zero_le _) this)] @[deprecated] alias length_removeNth := length_eraseIdx @[simp] theorem length_tail (l : List α) : length (tail l) = length l - 1 := by cases l <;> rfl @[simp] theorem eraseP_nil : [].eraseP p = [] := rfl theorem eraseP_cons (a : α) (l : List α) : (a :: l).eraseP p = bif p a then l else a :: l.eraseP p := rfl @[simp] theorem eraseP_cons_of_pos {l : List α} (p) (h : p a) : (a :: l).eraseP p = l := by simp [eraseP_cons, h] @[simp] theorem eraseP_cons_of_neg {l : List α} (p) (h : ¬p a) : (a :: l).eraseP p = a :: l.eraseP p := by simp [eraseP_cons, h] theorem eraseP_of_forall_not {l : List α} (h : ∀ a, a ∈ l → ¬p a) : l.eraseP p = l := by induction l with \| nil => rfl \| cons _ _ ih => simp [h _ (.head ..), ih (forall_mem_cons.1 h).2] theorem exists_of_eraseP : ∀ {l : List α} {a} (al : a ∈ l) (pa : p a), ∃ a l₁ l₂, (∀ b ∈ l₁, ¬p b) ∧ p a ∧ l = l₁ ++ a :: l₂ ∧ l.eraseP p = l₁ ++ l₂ \| b :: l, a, al, pa => if pb : p b then ⟨b, [], l, forall_mem_nil _, pb, by simp [pb]⟩ else match al with \| .head .. => nomatch pb pa \| .tail _ al => let ⟨c, l₁, l₂, h₁, h₂, h₃, h₄⟩ := exists_of_eraseP al pa ⟨c, b::l₁, l₂, (forall_mem_cons ..).2 ⟨pb, h₁⟩, h₂, by rw [h₃, cons_append], by simp [pb, h₄]⟩ theorem exists_or_eq_self_of_eraseP (p) (l : List α) : l.eraseP p = l ∨ ∃ a l₁ l₂, (∀ b ∈ l₁, ¬p b) ∧ p a ∧ l = l₁ ++ a :: l₂ ∧ l.eraseP p = l₁ ++ l₂ := if h : ∃ a ∈ l, p a then let ⟨_, ha, pa⟩ := h .inr (exists_of_eraseP ha pa) else .inl (eraseP_of_forall_not (h ⟨·, ·, ·⟩)) @[simp] theorem length_eraseP_of_mem (al : a ∈ l) (pa : p a) : length (l.eraseP p) = Nat.pred (length l) := by let ⟨_, l₁, l₂, _, _, e₁, e₂⟩ := exists_of_eraseP al pa rw [e₂]; simp [length_append, e₁]; rfl theorem eraseP_append_left {a : α} (pa : p a) : ∀ {l₁ : List α} l₂, a ∈ l₁ → (l₁++l₂).eraseP p = l₁.eraseP p ++ l₂ \| x :: xs, l₂, h => by by_cases h' : p x <;> simp [h'] rw [eraseP_append_left pa l₂ ((mem_cons.1 h).resolve_left (mt _ h'))] intro \| rfl => exact pa theorem eraseP_append_right : ∀ {l₁ : List α} l₂, (∀ b ∈ l₁, ¬p b) → eraseP p (l₁++l₂) = l₁ ++ l₂.eraseP p \| [], l₂, _ => rfl \| x :: xs, l₂, h => by simp [(forall_mem_cons.1 h).1, eraseP_append_right _ (forall_mem_cons.1 h).2] theorem eraseP_sublist (l : List α) : l.eraseP p <+ l := by match exists_or_eq_self_of_eraseP p l with \| .inl h => rw [h]; apply Sublist.refl \| .inr ⟨c, l₁, l₂, _, _, h₃, h₄⟩ => rw [h₄, h₃]; simp theorem eraseP_subset (l : List α) : l.eraseP p ⊆ l := (eraseP_sublist l).subset protected theorem Sublist.eraseP : l₁ <+ l₂ → l₁.eraseP p <+ l₂.eraseP p \| .slnil => Sublist.refl _ \| .cons a s => by by_cases h : p a <;> simp [h] exacts [s.eraseP.trans (eraseP_sublist _), s.eraseP.cons _] \| .cons₂ a s => by by_cases h : p a <;> simp [h] exacts [s, s.eraseP] theorem mem_of_mem_eraseP {l : List α} : a ∈ l.eraseP p → a ∈ l := (eraseP_subset _ ·) @[simp] theorem mem_eraseP_of_neg {l : List α} (pa : ¬p a) : a ∈ l.eraseP p ↔ a ∈ l := by refine ⟨mem_of_mem_eraseP, fun al => ?_⟩ match exists_or_eq_self_of_eraseP p l with \| .inl h => rw [h]; assumption \| .inr ⟨c, l₁, l₂, h₁, h₂, h₃, h₄⟩ => rw [h₄]; rw [h₃] at al have : a ≠ c := fun h => (h ▸ pa).elim h₂ simp [this] at al; simp [al] theorem eraseP_map (f : β → α) : ∀ (l : List β), (map f l).eraseP p = map f (l.eraseP (p ∘ f)) \| [] => rfl \| b::l => by by_cases h : p (f b) <;> simp [h, eraseP_map f l, eraseP_cons_of_pos] @[simp] theorem extractP_eq_find?_eraseP (l : List α) : extractP p l = (find? p l, eraseP p l) := by let rec go (acc) : ∀ xs, l = acc.data ++ xs → extractP.go p l xs acc = (xs.find? p, acc.data ++ xs.eraseP p) \| [] => fun h => by simp [extractP.go, find?, eraseP, h] \| x::xs => by simp [extractP.go, find?, eraseP]; cases p x <;> simp · intro h; rw [go _ xs]; {simp}; simp [h] exact go #[] _ rfl @[simp] theorem filter_sublist {p : α → Bool} : ∀ (l : List α), filter p l <+ l \| [] => .slnil \| a :: l => by rw [filter]; split <;> simp [Sublist.cons, Sublist.cons₂, filter_sublist l] theorem length_filter_le (p : α → Bool) (l : List α) : (l.filter p).length ≤ l.length := (filter_sublist _).length_le theorem length_filterMap_le (f : α → Option β) (l : List α) : (filterMap f l).length ≤ l.length := by rw [← length_map _ some, map_filterMap_some_eq_filter_map_is_some, ← length_map _ f] apply length_filter_le protected theorem Sublist.filterMap (f : α → Option β) (s : l₁ <+ l₂) : filterMap f l₁ <+ filterMap f l₂ := by induction s <;> simp <;> split <;> simp [, cons, cons₂] theorem Sublist.filter (p : α → Bool) {l₁ l₂} (s : l₁ <+ l₂) : filter p l₁ <+ filter p l₂ := by rw [← filterMap_eq_filter]; apply s.filterMap @[simp] theorem filter_eq_self {l} : filter p l = l ↔ ∀ a ∈ l, p a := by induction l with simp \| cons a l ih => cases h : p a <;> simp [] intro h; exact Nat.lt_irrefl _ (h ▸ length_filter_le p l) @[simp] theorem filter_length_eq_length {l} : (filter p l).length = l.length ↔ ∀ a ∈ l, p a := Iff.trans ⟨l.filter_sublist.eq_of_length, congrArg length⟩ filter_eq_self @[simp] theorem findIdx_nil {α : Type _} (p : α → Bool) : [].findIdx p = 0 := rfl theorem findIdx_cons (p : α → Bool) (b : α) (l : List α) : (b :: l).findIdx p = bif p b then 0 else (l.findIdx p) + 1 := by cases H : p b with \| true => simp [H, findIdx, findIdx.go] \| false => simp [H, findIdx, findIdx.go, findIdx_go_succ] where findIdx_go_succ (p : α → Bool) (l : List α) (n : Nat) : List.findIdx.go p l (n + 1) = (findIdx.go p l n) + 1 := by cases l with \| nil => unfold findIdx.go; exact Nat.succ_eq_add_one n \| cons head tail => unfold findIdx.go cases p head <;> simp only [cond_false, cond_true] exact findIdx_go_succ p tail (n + 1) theorem findIdx_of_get?_eq_some {xs : List α} (w : xs.get? (xs.findIdx p) = some y) : p y := by induction xs with \| nil => simp_all \| cons x xs ih => by_cases h : p x <;> simp_all [findIdx_cons] theorem findIdx_get {xs : List α} {w : xs.findIdx p < xs.length} : p (xs.get ⟨xs.findIdx p, w⟩) := xs.findIdx_of_get?_eq_some (get?_eq_get w) theorem findIdx_lt_length_of_exists {xs : List α} (h : ∃ x ∈ xs, p x) : xs.findIdx p < xs.length := by induction xs with \| nil => simp_all \| cons x xs ih => by_cases p x · simp_all only [forall_exists_index, and_imp, mem_cons, exists_eq_or_imp, true_or, findIdx_cons, cond_true, length_cons] apply Nat.succ_pos · simp_all [findIdx_cons] refine Nat.succ_lt_succ ?_ obtain ⟨x', m', h'⟩ := h exact ih x' m' h' theorem findIdx_get?_eq_get_of_exists {xs : List α} (h : ∃ x ∈ xs, p x) : xs.get? (xs.findIdx p) = some (xs.get ⟨xs.findIdx p, xs.findIdx_lt_length_of_exists h⟩) := get?_eq_get (findIdx_lt_length_of_exists h) @[simp] theorem findIdx?_nil : ([] : List α).findIdx? p i = none := rfl @[simp] theorem findIdx?_cons : (x :: xs).findIdx? p i = if p x then some i else findIdx? p xs (i + 1) := rfl @[simp] theorem findIdx?_succ : (xs : List α).findIdx? p (i+1) = (xs.findIdx? p i).map fun i => i + 1 := by induction xs generalizing i with simp \| cons _ _ _ => split <;> simp_all theorem findIdx?_eq_some_iff (xs : List α) (p : α → Bool) : xs.findIdx? p = some i ↔ (xs.take (i + 1)).map p = replicate i false ++ [true] := by induction xs generalizing i with \| nil => simp \| cons x xs ih => simp only [findIdx?_cons, Nat.zero_add, findIdx?_succ, take_succ_cons, map_cons] split <;> cases i <;> simp_all theorem findIdx?_of_eq_some {xs : List α} {p : α → Bool} (w : xs.findIdx? p = some i) : match xs.get? i with \| some a => p a \| none => false := by induction xs generalizing i with \| nil => simp_all \| cons x xs ih => simp_all only [findIdx?_cons, Nat.zero_add, findIdx?_succ] split at w <;> cases i <;> simp_all theorem findIdx?_of_eq_none {xs : List α} {p : α → Bool} (w : xs.findIdx? p = none) : ∀ i, match xs.get? i with \| some a => ¬ p a \| none => true := by intro i induction xs generalizing i with \| nil => simp_all \| cons x xs ih => simp_all only [Bool.not_eq_true, findIdx?_cons, Nat.zero_add, findIdx?_succ] cases i with \| zero => split at w <;> simp_all \| succ i => simp only [get?_cons_succ] apply ih split at w <;> simp_all @[simp] theorem findIdx?_append : (xs ++ ys : List α).findIdx? p = (xs.findIdx? p <\|> (ys.findIdx? p).map fun i => i + xs.length) := by induction xs with simp \| cons _ _ _ => split <;> simp_all [Option.map_orElse, Option.map_map]; rfl @[simp] theorem findIdx?_replicate : (replicate n a).findIdx? p = if 0 < n ∧ p a then some 0 else none := by induction n with \| zero => simp \| succ n ih => simp only [replicate, findIdx?_cons, Nat.zero_add, findIdx?_succ, Nat.zero_lt_succ, true_and] split <;> simp_all theorem Pairwise.sublist : l₁ <+ l₂ → l₂.Pairwise R → l₁.Pairwise R \| .slnil, h => h \| .cons _ s, .cons _ h₂ => h₂.sublist s \| .cons₂ _ s, .cons h₁ h₂ => (h₂.sublist s).cons fun _ h => h₁ _ (s.subset h) theorem pairwise_map {l : List α} : (l.map f).Pairwise R ↔ l.Pairwise fun a b => R (f a) (f b) := by induction l · simp · simp only [map, pairwise_cons, forall_mem_map_iff, ] theorem pairwise_append {l₁ l₂ : List α} : (l₁ ++ l₂).Pairwise R ↔ l₁.Pairwise R ∧ l₂.Pairwise R ∧ ∀ a ∈ l₁, ∀ b ∈ l₂, R a b := by induction l₁ <;> simp [, or_imp, forall_and, and_assoc, and_left_comm] theorem pairwise_reverse {l : List α} : l.reverse.Pairwise R ↔ l.Pairwise (fun a b => R b a) := by induction l <;> simp [, pairwise_append, and_comm] theorem Pairwise.imp {α R S} (H : ∀ {a b}, R a b → S a b) : ∀ {l : List α}, l.Pairwise R → l.Pairwise S \| _, .nil => .nil \| _, .cons h₁ h₂ => .cons (H ∘ h₁ ·) (h₂.imp H) theorem replaceF_nil : [].replaceF p = [] := rfl theorem replaceF_cons (a : α) (l : List α) : (a :: l).replaceF p = match p a with \| none => a :: replaceF p l \| some a' => a' :: l := rfl theorem replaceF_cons_of_some {l : List α} (p) (h : p a = some a') : (a :: l).replaceF p = a' :: l := by simp [replaceF_cons, h] theorem replaceF_cons_of_none {l : List α} (p) (h : p a = none) : (a :: l).replaceF p = a :: l.replaceF p := by simp [replaceF_cons, h] theorem replaceF_of_forall_none {l : List α} (h : ∀ a, a ∈ l → p a = none) : l.replaceF p = l := by induction l with \| nil => rfl \| cons _ _ ih => simp [h _ (.head ..), ih (forall_mem_cons.1 h).2] theorem exists_of_replaceF : ∀ {l : List α} {a a'} (al : a ∈ l) (pa : p a = some a'), ∃ a a' l₁ l₂, (∀ b ∈ l₁, p b = none) ∧ p a = some a' ∧ l = l₁ ++ a :: l₂ ∧ l.replaceF p = l₁ ++ a' :: l₂ \| b :: l, a, a', al, pa => match pb : p b with \| some b' => ⟨b, b', [], l, forall_mem_nil _, pb, by simp [pb]⟩ \| none => match al with \| .head .. => nomatch pb.symm.trans pa \| .tail _ al => let ⟨c, c', l₁, l₂, h₁, h₂, h₃, h₄⟩ := exists_of_replaceF al pa ⟨c, c', b::l₁, l₂, (forall_mem_cons ..).2 ⟨pb, h₁⟩, h₂, by rw [h₃, cons_append], by simp [pb, h₄]⟩ theorem exists_or_eq_self_of_replaceF (p) (l : List α) : l.replaceF p = l ∨ ∃ a a' l₁ l₂, (∀ b ∈ l₁, p b = none) ∧ p a = some a' ∧ l = l₁ ++ a :: l₂ ∧ l.replaceF p = l₁ ++ a' :: l₂ := if h : ∃ a ∈ l, (p a).isSome then let ⟨_, ha, pa⟩ := h .inr (exists_of_replaceF ha (Option.get_mem pa)) else .inl <\| replaceF_of_forall_none fun a ha => Option.not_isSome_iff_eq_none.1 fun h' => h ⟨a, ha, h'⟩ @[simp] theorem length_replaceF : length (replaceF f l) = length l := by induction l <;> simp [replaceF]; split <;> simp [] theorem disjoint_symm (d : Disjoint l₁ l₂) : Disjoint l₂ l₁ := fun _ i₂ i₁ => d i₁ i₂ theorem disjoint_comm : Disjoint l₁ l₂ ↔ Disjoint l₂ l₁ := ⟨disjoint_symm, disjoint_symm⟩	.lake/packages/batteries/Batteries/Data/List/Lemmas.lean	819	819	theorem disjoint_left : Disjoint l₁ l₂ ↔ ∀ ⦃a⦄, a ∈ l₁ → a ∉ l₂ := by	simp [Disjoint]
import Mathlib.MeasureTheory.Function.LpSeminorm.Basic import Mathlib.MeasureTheory.Integral.MeanInequalities #align_import measure_theory.function.lp_seminorm from "leanprover-community/mathlib"@"c4015acc0a223449d44061e27ddac1835a3852b9" open Filter open scoped ENNReal Topology namespace MeasureTheory variable {α E : Type} {m : MeasurableSpace α} [NormedAddCommGroup E] {p : ℝ≥0∞} {q : ℝ} {μ : Measure α} {f g : α → E} theorem snorm'_add_le {f g : α → E} (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) (hq1 : 1 ≤ q) : snorm' (f + g) q μ ≤ snorm' f q μ + snorm' g q μ := calc (∫⁻ a, (‖(f + g) a‖₊ : ℝ≥0∞) ^ q ∂μ) ^ (1 / q) ≤ (∫⁻ a, ((fun a => (‖f a‖₊ : ℝ≥0∞)) + fun a => (‖g a‖₊ : ℝ≥0∞)) a ^ q ∂μ) ^ (1 / q) := by gcongr with a simp only [Pi.add_apply, ← ENNReal.coe_add, ENNReal.coe_le_coe, nnnorm_add_le] _ ≤ snorm' f q μ + snorm' g q μ := ENNReal.lintegral_Lp_add_le hf.ennnorm hg.ennnorm hq1 #align measure_theory.snorm'_add_le MeasureTheory.snorm'_add_le theorem snorm'_add_le_of_le_one {f g : α → E} (hf : AEStronglyMeasurable f μ) (hq0 : 0 ≤ q) (hq1 : q ≤ 1) : snorm' (f + g) q μ ≤ (2 : ℝ≥0∞) ^ (1 / q - 1) (snorm' f q μ + snorm' g q μ) := calc (∫⁻ a, (‖(f + g) a‖₊ : ℝ≥0∞) ^ q ∂μ) ^ (1 / q) ≤ (∫⁻ a, ((fun a => (‖f a‖₊ : ℝ≥0∞)) + fun a => (‖g a‖₊ : ℝ≥0∞)) a ^ q ∂μ) ^ (1 / q) := by gcongr with a simp only [Pi.add_apply, ← ENNReal.coe_add, ENNReal.coe_le_coe, nnnorm_add_le] _ ≤ (2 : ℝ≥0∞) ^ (1 / q - 1) * (snorm' f q μ + snorm' g q μ) := ENNReal.lintegral_Lp_add_le_of_le_one hf.ennnorm hq0 hq1 #align measure_theory.snorm'_add_le_of_le_one MeasureTheory.snorm'_add_le_of_le_one theorem snormEssSup_add_le {f g : α → E} : snormEssSup (f + g) μ ≤ snormEssSup f μ + snormEssSup g μ := by refine le_trans (essSup_mono_ae (eventually_of_forall fun x => ?_)) (ENNReal.essSup_add_le _ _) simp_rw [Pi.add_apply, ← ENNReal.coe_add, ENNReal.coe_le_coe] exact nnnorm_add_le _ _ #align measure_theory.snorm_ess_sup_add_le MeasureTheory.snormEssSup_add_le theorem snorm_add_le {f g : α → E} (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) (hp1 : 1 ≤ p) : snorm (f + g) p μ ≤ snorm f p μ + snorm g p μ := by by_cases hp0 : p = 0 · simp [hp0] by_cases hp_top : p = ∞ · simp [hp_top, snormEssSup_add_le] have hp1_real : 1 ≤ p.toReal := by rwa [← ENNReal.one_toReal, ENNReal.toReal_le_toReal ENNReal.one_ne_top hp_top] repeat rw [snorm_eq_snorm' hp0 hp_top] exact snorm'_add_le hf hg hp1_real #align measure_theory.snorm_add_le MeasureTheory.snorm_add_le noncomputable def LpAddConst (p : ℝ≥0∞) : ℝ≥0∞ := if p ∈ Set.Ioo (0 : ℝ≥0∞) 1 then (2 : ℝ≥0∞) ^ (1 / p.toReal - 1) else 1 set_option linter.uppercaseLean3 false in #align measure_theory.Lp_add_const MeasureTheory.LpAddConst theorem LpAddConst_of_one_le {p : ℝ≥0∞} (hp : 1 ≤ p) : LpAddConst p = 1 := by rw [LpAddConst, if_neg] intro h exact lt_irrefl _ (h.2.trans_le hp) set_option linter.uppercaseLean3 false in #align measure_theory.Lp_add_const_of_one_le MeasureTheory.LpAddConst_of_one_le theorem LpAddConst_zero : LpAddConst 0 = 1 := by rw [LpAddConst, if_neg] intro h exact lt_irrefl _ h.1 set_option linter.uppercaseLean3 false in #align measure_theory.Lp_add_const_zero MeasureTheory.LpAddConst_zero theorem LpAddConst_lt_top (p : ℝ≥0∞) : LpAddConst p < ∞ := by rw [LpAddConst] split_ifs with h · apply ENNReal.rpow_lt_top_of_nonneg _ ENNReal.two_ne_top simp only [one_div, sub_nonneg] apply one_le_inv (ENNReal.toReal_pos h.1.ne' (h.2.trans ENNReal.one_lt_top).ne) simpa using ENNReal.toReal_mono ENNReal.one_ne_top h.2.le · exact ENNReal.one_lt_top set_option linter.uppercaseLean3 false in #align measure_theory.Lp_add_const_lt_top MeasureTheory.LpAddConst_lt_top theorem snorm_add_le' {f g : α → E} (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) (p : ℝ≥0∞) : snorm (f + g) p μ ≤ LpAddConst p * (snorm f p μ + snorm g p μ) := by rcases eq_or_ne p 0 with (rfl \| hp) · simp only [snorm_exponent_zero, add_zero, mul_zero, le_zero_iff] rcases lt_or_le p 1 with (h'p \| h'p) · simp only [snorm_eq_snorm' hp (h'p.trans ENNReal.one_lt_top).ne] convert snorm'_add_le_of_le_one hf ENNReal.toReal_nonneg _ · have : p ∈ Set.Ioo (0 : ℝ≥0∞) 1 := ⟨hp.bot_lt, h'p⟩ simp only [LpAddConst, if_pos this] · simpa using ENNReal.toReal_mono ENNReal.one_ne_top h'p.le · simp [LpAddConst_of_one_le h'p] exact snorm_add_le hf hg h'p #align measure_theory.snorm_add_le' MeasureTheory.snorm_add_le' variable (μ E) theorem exists_Lp_half (p : ℝ≥0∞) {δ : ℝ≥0∞} (hδ : δ ≠ 0) : ∃ η : ℝ≥0∞, 0 < η ∧ ∀ (f g : α → E), AEStronglyMeasurable f μ → AEStronglyMeasurable g μ → snorm f p μ ≤ η → snorm g p μ ≤ η → snorm (f + g) p μ < δ := by have : Tendsto (fun η : ℝ≥0∞ => LpAddConst p * (η + η)) (𝓝[>] 0) (𝓝 (LpAddConst p * (0 + 0))) := (ENNReal.Tendsto.const_mul (tendsto_id.add tendsto_id) (Or.inr (LpAddConst_lt_top p).ne)).mono_left nhdsWithin_le_nhds simp only [add_zero, mul_zero] at this rcases (((tendsto_order.1 this).2 δ hδ.bot_lt).and self_mem_nhdsWithin).exists with ⟨η, hη, ηpos⟩ refine ⟨η, ηpos, fun f g hf hg Hf Hg => ?_⟩ calc snorm (f + g) p μ ≤ LpAddConst p * (snorm f p μ + snorm g p μ) := snorm_add_le' hf hg p _ ≤ LpAddConst p * (η + η) := by gcongr _ < δ := hη set_option linter.uppercaseLean3 false in #align measure_theory.exists_Lp_half MeasureTheory.exists_Lp_half variable {μ E} theorem snorm_sub_le' {f g : α → E} (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) (p : ℝ≥0∞) : snorm (f - g) p μ ≤ LpAddConst p * (snorm f p μ + snorm g p μ) := by simpa only [sub_eq_add_neg, snorm_neg] using snorm_add_le' hf hg.neg p #align measure_theory.snorm_sub_le' MeasureTheory.snorm_sub_le'	Mathlib/MeasureTheory/Function/LpSeminorm/TriangleInequality.lean	145	147	theorem snorm_sub_le {f g : α → E} (hf : AEStronglyMeasurable f μ) (hg : AEStronglyMeasurable g μ) (hp : 1 ≤ p) : snorm (f - g) p μ ≤ snorm f p μ + snorm g p μ := by	simpa [LpAddConst_of_one_le hp] using snorm_sub_le' hf hg p
import Mathlib.Algebra.Group.Ext import Mathlib.CategoryTheory.Limits.Shapes.Biproducts import Mathlib.CategoryTheory.Limits.Preserves.Shapes.BinaryProducts import Mathlib.CategoryTheory.Limits.Preserves.Shapes.Biproducts import Mathlib.CategoryTheory.Limits.Preserves.Shapes.Products import Mathlib.CategoryTheory.Preadditive.Basic import Mathlib.Tactic.Abel #align_import category_theory.preadditive.biproducts from "leanprover-community/mathlib"@"a176cb1219e300e85793d44583dede42377b51af" open CategoryTheory open CategoryTheory.Preadditive open CategoryTheory.Limits open CategoryTheory.Functor open CategoryTheory.Preadditive open scoped Classical universe v v' u u' noncomputable section namespace CategoryTheory variable {C : Type u} [Category.{v} C] [Preadditive C] namespace Limits theorem HasFiniteBiproducts.of_hasFiniteProducts [HasFiniteProducts C] : HasFiniteBiproducts C := ⟨fun _ => { has_biproduct := fun _ => HasBiproduct.of_hasProduct _ }⟩ #align category_theory.limits.has_finite_biproducts.of_has_finite_products CategoryTheory.Limits.HasFiniteBiproducts.of_hasFiniteProducts theorem HasFiniteBiproducts.of_hasFiniteCoproducts [HasFiniteCoproducts C] : HasFiniteBiproducts C := ⟨fun _ => { has_biproduct := fun _ => HasBiproduct.of_hasCoproduct _ }⟩ #align category_theory.limits.has_finite_biproducts.of_has_finite_coproducts CategoryTheory.Limits.HasFiniteBiproducts.of_hasFiniteCoproducts @[simps] def biproduct.reindex {β γ : Type} [Finite β] (ε : β ≃ γ) (f : γ → C) [HasBiproduct f] [HasBiproduct (f ∘ ε)] : ⨁ f ∘ ε ≅ ⨁ f where hom := biproduct.desc fun b => biproduct.ι f (ε b) inv := biproduct.lift fun b => biproduct.π f (ε b) hom_inv_id := by ext b b' by_cases h : b' = b · subst h; simp · have : ε b' ≠ ε b := by simp [h] simp [biproduct.ι_π_ne _ h, biproduct.ι_π_ne _ this] inv_hom_id := by cases nonempty_fintype β ext g g' by_cases h : g' = g <;> simp [Preadditive.sum_comp, Preadditive.comp_sum, biproduct.lift_desc, biproduct.ι_π, biproduct.ι_π_assoc, comp_dite, Equiv.apply_eq_iff_eq_symm_apply, Finset.sum_dite_eq' Finset.univ (ε.symm g') _, h] #align category_theory.limits.biproduct.reindex CategoryTheory.Limits.biproduct.reindex def isBinaryBilimitOfTotal {X Y : C} (b : BinaryBicone X Y) (total : b.fst ≫ b.inl + b.snd ≫ b.inr = 𝟙 b.pt) : b.IsBilimit where isLimit := { lift := fun s => (BinaryFan.fst s ≫ b.inl : s.pt ⟶ b.pt) + (BinaryFan.snd s ≫ b.inr : s.pt ⟶ b.pt) uniq := fun s m h => by have reassoced (j : WalkingPair) {W : C} (h' : _ ⟶ W) : m ≫ b.toCone.π.app ⟨j⟩ ≫ h' = s.π.app ⟨j⟩ ≫ h' := by rw [← Category.assoc, eq_whisker (h ⟨j⟩)] erw [← Category.comp_id m, ← total, comp_add, reassoced WalkingPair.left, reassoced WalkingPair.right] fac := fun s j => by rcases j with ⟨⟨⟩⟩ <;> simp } isColimit := { desc := fun s => (b.fst ≫ BinaryCofan.inl s : b.pt ⟶ s.pt) + (b.snd ≫ BinaryCofan.inr s : b.pt ⟶ s.pt) uniq := fun s m h => by erw [← Category.id_comp m, ← total, add_comp, Category.assoc, Category.assoc, h ⟨WalkingPair.left⟩, h ⟨WalkingPair.right⟩] fac := fun s j => by rcases j with ⟨⟨⟩⟩ <;> simp } #align category_theory.limits.is_binary_bilimit_of_total CategoryTheory.Limits.isBinaryBilimitOfTotal theorem IsBilimit.binary_total {X Y : C} {b : BinaryBicone X Y} (i : b.IsBilimit) : b.fst ≫ b.inl + b.snd ≫ b.inr = 𝟙 b.pt := i.isLimit.hom_ext fun j => by rcases j with ⟨⟨⟩⟩ <;> simp #align category_theory.limits.is_bilimit.binary_total CategoryTheory.Limits.IsBilimit.binary_total theorem hasBinaryBiproduct_of_total {X Y : C} (b : BinaryBicone X Y) (total : b.fst ≫ b.inl + b.snd ≫ b.inr = 𝟙 b.pt) : HasBinaryBiproduct X Y := HasBinaryBiproduct.mk { bicone := b isBilimit := isBinaryBilimitOfTotal b total } #align category_theory.limits.has_binary_biproduct_of_total CategoryTheory.Limits.hasBinaryBiproduct_of_total @[simps] def BinaryBicone.ofLimitCone {X Y : C} {t : Cone (pair X Y)} (ht : IsLimit t) : BinaryBicone X Y where pt := t.pt fst := t.π.app ⟨WalkingPair.left⟩ snd := t.π.app ⟨WalkingPair.right⟩ inl := ht.lift (BinaryFan.mk (𝟙 X) 0) inr := ht.lift (BinaryFan.mk 0 (𝟙 Y)) #align category_theory.limits.binary_bicone.of_limit_cone CategoryTheory.Limits.BinaryBicone.ofLimitCone theorem inl_of_isLimit {X Y : C} {t : BinaryBicone X Y} (ht : IsLimit t.toCone) : t.inl = ht.lift (BinaryFan.mk (𝟙 X) 0) := by apply ht.uniq (BinaryFan.mk (𝟙 X) 0); rintro ⟨⟨⟩⟩ <;> dsimp <;> simp #align category_theory.limits.inl_of_is_limit CategoryTheory.Limits.inl_of_isLimit theorem inr_of_isLimit {X Y : C} {t : BinaryBicone X Y} (ht : IsLimit t.toCone) : t.inr = ht.lift (BinaryFan.mk 0 (𝟙 Y)) := by apply ht.uniq (BinaryFan.mk 0 (𝟙 Y)); rintro ⟨⟨⟩⟩ <;> dsimp <;> simp #align category_theory.limits.inr_of_is_limit CategoryTheory.Limits.inr_of_isLimit def isBinaryBilimitOfIsLimit {X Y : C} (t : BinaryBicone X Y) (ht : IsLimit t.toCone) : t.IsBilimit := isBinaryBilimitOfTotal _ (by refine BinaryFan.IsLimit.hom_ext ht ?_ ?_ <;> simp) #align category_theory.limits.is_binary_bilimit_of_is_limit CategoryTheory.Limits.isBinaryBilimitOfIsLimit def binaryBiconeIsBilimitOfLimitConeOfIsLimit {X Y : C} {t : Cone (pair X Y)} (ht : IsLimit t) : (BinaryBicone.ofLimitCone ht).IsBilimit := isBinaryBilimitOfTotal _ <\| BinaryFan.IsLimit.hom_ext ht (by simp) (by simp) #align category_theory.limits.binary_bicone_is_bilimit_of_limit_cone_of_is_limit CategoryTheory.Limits.binaryBiconeIsBilimitOfLimitConeOfIsLimit theorem HasBinaryBiproduct.of_hasBinaryProduct (X Y : C) [HasBinaryProduct X Y] : HasBinaryBiproduct X Y := HasBinaryBiproduct.mk { bicone := _ isBilimit := binaryBiconeIsBilimitOfLimitConeOfIsLimit (limit.isLimit _) } #align category_theory.limits.has_binary_biproduct.of_has_binary_product CategoryTheory.Limits.HasBinaryBiproduct.of_hasBinaryProduct theorem HasBinaryBiproducts.of_hasBinaryProducts [HasBinaryProducts C] : HasBinaryBiproducts C := { has_binary_biproduct := fun X Y => HasBinaryBiproduct.of_hasBinaryProduct X Y } #align category_theory.limits.has_binary_biproducts.of_has_binary_products CategoryTheory.Limits.HasBinaryBiproducts.of_hasBinaryProducts @[simps] def BinaryBicone.ofColimitCocone {X Y : C} {t : Cocone (pair X Y)} (ht : IsColimit t) : BinaryBicone X Y where pt := t.pt fst := ht.desc (BinaryCofan.mk (𝟙 X) 0) snd := ht.desc (BinaryCofan.mk 0 (𝟙 Y)) inl := t.ι.app ⟨WalkingPair.left⟩ inr := t.ι.app ⟨WalkingPair.right⟩ #align category_theory.limits.binary_bicone.of_colimit_cocone CategoryTheory.Limits.BinaryBicone.ofColimitCocone theorem fst_of_isColimit {X Y : C} {t : BinaryBicone X Y} (ht : IsColimit t.toCocone) : t.fst = ht.desc (BinaryCofan.mk (𝟙 X) 0) := by apply ht.uniq (BinaryCofan.mk (𝟙 X) 0) rintro ⟨⟨⟩⟩ <;> dsimp <;> simp #align category_theory.limits.fst_of_is_colimit CategoryTheory.Limits.fst_of_isColimit	Mathlib/CategoryTheory/Preadditive/Biproducts.lean	421	424	theorem snd_of_isColimit {X Y : C} {t : BinaryBicone X Y} (ht : IsColimit t.toCocone) : t.snd = ht.desc (BinaryCofan.mk 0 (𝟙 Y)) := by	apply ht.uniq (BinaryCofan.mk 0 (𝟙 Y)) rintro ⟨⟨⟩⟩ <;> dsimp <;> simp
import Mathlib.Order.Heyting.Basic #align_import order.boolean_algebra from "leanprover-community/mathlib"@"9ac7c0c8c4d7a535ec3e5b34b8859aab9233b2f4" open Function OrderDual universe u v variable {α : Type u} {β : Type*} {w x y z : α} class GeneralizedBooleanAlgebra (α : Type u) extends DistribLattice α, SDiff α, Bot α where sup_inf_sdiff : ∀ a b : α, a ⊓ b ⊔ a \ b = a inf_inf_sdiff : ∀ a b : α, a ⊓ b ⊓ a \ b = ⊥ #align generalized_boolean_algebra GeneralizedBooleanAlgebra -- We might want an `IsCompl_of` predicate (for relative complements) generalizing `IsCompl`, -- however we'd need another type class for lattices with bot, and all the API for that. section GeneralizedBooleanAlgebra variable [GeneralizedBooleanAlgebra α] @[simp] theorem sup_inf_sdiff (x y : α) : x ⊓ y ⊔ x \ y = x := GeneralizedBooleanAlgebra.sup_inf_sdiff _ _ #align sup_inf_sdiff sup_inf_sdiff @[simp] theorem inf_inf_sdiff (x y : α) : x ⊓ y ⊓ x \ y = ⊥ := GeneralizedBooleanAlgebra.inf_inf_sdiff _ _ #align inf_inf_sdiff inf_inf_sdiff @[simp] theorem sup_sdiff_inf (x y : α) : x \ y ⊔ x ⊓ y = x := by rw [sup_comm, sup_inf_sdiff] #align sup_sdiff_inf sup_sdiff_inf @[simp] theorem inf_sdiff_inf (x y : α) : x \ y ⊓ (x ⊓ y) = ⊥ := by rw [inf_comm, inf_inf_sdiff] #align inf_sdiff_inf inf_sdiff_inf -- see Note [lower instance priority] instance (priority := 100) GeneralizedBooleanAlgebra.toOrderBot : OrderBot α where __ := GeneralizedBooleanAlgebra.toBot bot_le a := by rw [← inf_inf_sdiff a a, inf_assoc] exact inf_le_left #align generalized_boolean_algebra.to_order_bot GeneralizedBooleanAlgebra.toOrderBot theorem disjoint_inf_sdiff : Disjoint (x ⊓ y) (x \ y) := disjoint_iff_inf_le.mpr (inf_inf_sdiff x y).le #align disjoint_inf_sdiff disjoint_inf_sdiff -- TODO: in distributive lattices, relative complements are unique when they exist theorem sdiff_unique (s : x ⊓ y ⊔ z = x) (i : x ⊓ y ⊓ z = ⊥) : x \ y = z := by conv_rhs at s => rw [← sup_inf_sdiff x y, sup_comm] rw [sup_comm] at s conv_rhs at i => rw [← inf_inf_sdiff x y, inf_comm] rw [inf_comm] at i exact (eq_of_inf_eq_sup_eq i s).symm #align sdiff_unique sdiff_unique -- Use `sdiff_le` private theorem sdiff_le' : x \ y ≤ x := calc x \ y ≤ x ⊓ y ⊔ x \ y := le_sup_right _ = x := sup_inf_sdiff x y -- Use `sdiff_sup_self` private theorem sdiff_sup_self' : y \ x ⊔ x = y ⊔ x := calc y \ x ⊔ x = y \ x ⊔ (x ⊔ x ⊓ y) := by rw [sup_inf_self] _ = y ⊓ x ⊔ y \ x ⊔ x := by ac_rfl _ = y ⊔ x := by rw [sup_inf_sdiff] @[simp] theorem sdiff_inf_sdiff : x \ y ⊓ y \ x = ⊥ := Eq.symm <\| calc ⊥ = x ⊓ y ⊓ x \ y := by rw [inf_inf_sdiff] _ = x ⊓ (y ⊓ x ⊔ y \ x) ⊓ x \ y := by rw [sup_inf_sdiff] _ = (x ⊓ (y ⊓ x) ⊔ x ⊓ y \ x) ⊓ x \ y := by rw [inf_sup_left] _ = (y ⊓ (x ⊓ x) ⊔ x ⊓ y \ x) ⊓ x \ y := by ac_rfl _ = (y ⊓ x ⊔ x ⊓ y \ x) ⊓ x \ y := by rw [inf_idem] _ = x ⊓ y ⊓ x \ y ⊔ x ⊓ y \ x ⊓ x \ y := by rw [inf_sup_right, inf_comm x y] _ = x ⊓ y \ x ⊓ x \ y := by rw [inf_inf_sdiff, bot_sup_eq] _ = x ⊓ x \ y ⊓ y \ x := by ac_rfl _ = x \ y ⊓ y \ x := by rw [inf_of_le_right sdiff_le'] #align sdiff_inf_sdiff sdiff_inf_sdiff theorem disjoint_sdiff_sdiff : Disjoint (x \ y) (y \ x) := disjoint_iff_inf_le.mpr sdiff_inf_sdiff.le #align disjoint_sdiff_sdiff disjoint_sdiff_sdiff @[simp] theorem inf_sdiff_self_right : x ⊓ y \ x = ⊥ := calc x ⊓ y \ x = (x ⊓ y ⊔ x \ y) ⊓ y \ x := by rw [sup_inf_sdiff] _ = x ⊓ y ⊓ y \ x ⊔ x \ y ⊓ y \ x := by rw [inf_sup_right] _ = ⊥ := by rw [inf_comm x y, inf_inf_sdiff, sdiff_inf_sdiff, bot_sup_eq] #align inf_sdiff_self_right inf_sdiff_self_right @[simp] theorem inf_sdiff_self_left : y \ x ⊓ x = ⊥ := by rw [inf_comm, inf_sdiff_self_right] #align inf_sdiff_self_left inf_sdiff_self_left -- see Note [lower instance priority] instance (priority := 100) GeneralizedBooleanAlgebra.toGeneralizedCoheytingAlgebra : GeneralizedCoheytingAlgebra α where __ := ‹GeneralizedBooleanAlgebra α› __ := GeneralizedBooleanAlgebra.toOrderBot sdiff := (· \ ·) sdiff_le_iff y x z := ⟨fun h => le_of_inf_le_sup_le (le_of_eq (calc y ⊓ y \ x = y \ x := inf_of_le_right sdiff_le' _ = x ⊓ y \ x ⊔ z ⊓ y \ x := by rw [inf_eq_right.2 h, inf_sdiff_self_right, bot_sup_eq] _ = (x ⊔ z) ⊓ y \ x := by rw [← inf_sup_right])) (calc y ⊔ y \ x = y := sup_of_le_left sdiff_le' _ ≤ y ⊔ (x ⊔ z) := le_sup_left _ = y \ x ⊔ x ⊔ z := by rw [← sup_assoc, ← @sdiff_sup_self' _ x y] _ = x ⊔ z ⊔ y \ x := by ac_rfl), fun h => le_of_inf_le_sup_le (calc y \ x ⊓ x = ⊥ := inf_sdiff_self_left _ ≤ z ⊓ x := bot_le) (calc y \ x ⊔ x = y ⊔ x := sdiff_sup_self' _ ≤ x ⊔ z ⊔ x := sup_le_sup_right h x _ ≤ z ⊔ x := by rw [sup_assoc, sup_comm, sup_assoc, sup_idem])⟩ #align generalized_boolean_algebra.to_generalized_coheyting_algebra GeneralizedBooleanAlgebra.toGeneralizedCoheytingAlgebra theorem disjoint_sdiff_self_left : Disjoint (y \ x) x := disjoint_iff_inf_le.mpr inf_sdiff_self_left.le #align disjoint_sdiff_self_left disjoint_sdiff_self_left theorem disjoint_sdiff_self_right : Disjoint x (y \ x) := disjoint_iff_inf_le.mpr inf_sdiff_self_right.le #align disjoint_sdiff_self_right disjoint_sdiff_self_right lemma le_sdiff : x ≤ y \ z ↔ x ≤ y ∧ Disjoint x z := ⟨fun h ↦ ⟨h.trans sdiff_le, disjoint_sdiff_self_left.mono_left h⟩, fun h ↦ by rw [← h.2.sdiff_eq_left]; exact sdiff_le_sdiff_right h.1⟩ #align le_sdiff le_sdiff @[simp] lemma sdiff_eq_left : x \ y = x ↔ Disjoint x y := ⟨fun h ↦ disjoint_sdiff_self_left.mono_left h.ge, Disjoint.sdiff_eq_left⟩ #align sdiff_eq_left sdiff_eq_left theorem Disjoint.sdiff_eq_of_sup_eq (hi : Disjoint x z) (hs : x ⊔ z = y) : y \ x = z := have h : y ⊓ x = x := inf_eq_right.2 <\| le_sup_left.trans hs.le sdiff_unique (by rw [h, hs]) (by rw [h, hi.eq_bot]) #align disjoint.sdiff_eq_of_sup_eq Disjoint.sdiff_eq_of_sup_eq protected theorem Disjoint.sdiff_unique (hd : Disjoint x z) (hz : z ≤ y) (hs : y ≤ x ⊔ z) : y \ x = z := sdiff_unique (by rw [← inf_eq_right] at hs rwa [sup_inf_right, inf_sup_right, sup_comm x, inf_sup_self, inf_comm, sup_comm z, hs, sup_eq_left]) (by rw [inf_assoc, hd.eq_bot, inf_bot_eq]) #align disjoint.sdiff_unique Disjoint.sdiff_unique -- cf. `IsCompl.disjoint_left_iff` and `IsCompl.disjoint_right_iff` theorem disjoint_sdiff_iff_le (hz : z ≤ y) (hx : x ≤ y) : Disjoint z (y \ x) ↔ z ≤ x := ⟨fun H => le_of_inf_le_sup_le (le_trans H.le_bot bot_le) (by rw [sup_sdiff_cancel_right hx] refine le_trans (sup_le_sup_left sdiff_le z) ?_ rw [sup_eq_right.2 hz]), fun H => disjoint_sdiff_self_right.mono_left H⟩ #align disjoint_sdiff_iff_le disjoint_sdiff_iff_le -- cf. `IsCompl.le_left_iff` and `IsCompl.le_right_iff` theorem le_iff_disjoint_sdiff (hz : z ≤ y) (hx : x ≤ y) : z ≤ x ↔ Disjoint z (y \ x) := (disjoint_sdiff_iff_le hz hx).symm #align le_iff_disjoint_sdiff le_iff_disjoint_sdiff -- cf. `IsCompl.inf_left_eq_bot_iff` and `IsCompl.inf_right_eq_bot_iff` theorem inf_sdiff_eq_bot_iff (hz : z ≤ y) (hx : x ≤ y) : z ⊓ y \ x = ⊥ ↔ z ≤ x := by rw [← disjoint_iff] exact disjoint_sdiff_iff_le hz hx #align inf_sdiff_eq_bot_iff inf_sdiff_eq_bot_iff -- cf. `IsCompl.left_le_iff` and `IsCompl.right_le_iff` theorem le_iff_eq_sup_sdiff (hz : z ≤ y) (hx : x ≤ y) : x ≤ z ↔ y = z ⊔ y \ x := ⟨fun H => by apply le_antisymm · conv_lhs => rw [← sup_inf_sdiff y x] apply sup_le_sup_right rwa [inf_eq_right.2 hx] · apply le_trans · apply sup_le_sup_right hz · rw [sup_sdiff_left], fun H => by conv_lhs at H => rw [← sup_sdiff_cancel_right hx] refine le_of_inf_le_sup_le ?_ H.le rw [inf_sdiff_self_right] exact bot_le⟩ #align le_iff_eq_sup_sdiff le_iff_eq_sup_sdiff -- cf. `IsCompl.sup_inf` theorem sdiff_sup : y \ (x ⊔ z) = y \ x ⊓ y \ z := sdiff_unique (calc y ⊓ (x ⊔ z) ⊔ y \ x ⊓ y \ z = (y ⊓ (x ⊔ z) ⊔ y \ x) ⊓ (y ⊓ (x ⊔ z) ⊔ y \ z) := by rw [sup_inf_left] _ = (y ⊓ x ⊔ y ⊓ z ⊔ y \ x) ⊓ (y ⊓ x ⊔ y ⊓ z ⊔ y \ z) := by rw [@inf_sup_left _ _ y] _ = (y ⊓ z ⊔ (y ⊓ x ⊔ y \ x)) ⊓ (y ⊓ x ⊔ (y ⊓ z ⊔ y \ z)) := by ac_rfl _ = (y ⊓ z ⊔ y) ⊓ (y ⊓ x ⊔ y) := by rw [sup_inf_sdiff, sup_inf_sdiff] _ = (y ⊔ y ⊓ z) ⊓ (y ⊔ y ⊓ x) := by ac_rfl _ = y := by rw [sup_inf_self, sup_inf_self, inf_idem]) (calc y ⊓ (x ⊔ z) ⊓ (y \ x ⊓ y \ z) = (y ⊓ x ⊔ y ⊓ z) ⊓ (y \ x ⊓ y \ z) := by rw [inf_sup_left] _ = y ⊓ x ⊓ (y \ x ⊓ y \ z) ⊔ y ⊓ z ⊓ (y \ x ⊓ y \ z) := by rw [inf_sup_right] _ = y ⊓ x ⊓ y \ x ⊓ y \ z ⊔ y \ x ⊓ (y \ z ⊓ (y ⊓ z)) := by ac_rfl _ = ⊥ := by rw [inf_inf_sdiff, bot_inf_eq, bot_sup_eq, inf_comm (y \ z), inf_inf_sdiff, inf_bot_eq]) #align sdiff_sup sdiff_sup theorem sdiff_eq_sdiff_iff_inf_eq_inf : y \ x = y \ z ↔ y ⊓ x = y ⊓ z := ⟨fun h => eq_of_inf_eq_sup_eq (by rw [inf_inf_sdiff, h, inf_inf_sdiff]) (by rw [sup_inf_sdiff, h, sup_inf_sdiff]), fun h => by rw [← sdiff_inf_self_right, ← sdiff_inf_self_right z y, inf_comm, h, inf_comm]⟩ #align sdiff_eq_sdiff_iff_inf_eq_inf sdiff_eq_sdiff_iff_inf_eq_inf theorem sdiff_eq_self_iff_disjoint : x \ y = x ↔ Disjoint y x := calc x \ y = x ↔ x \ y = x \ ⊥ := by rw [sdiff_bot] _ ↔ x ⊓ y = x ⊓ ⊥ := sdiff_eq_sdiff_iff_inf_eq_inf _ ↔ Disjoint y x := by rw [inf_bot_eq, inf_comm, disjoint_iff] #align sdiff_eq_self_iff_disjoint sdiff_eq_self_iff_disjoint theorem sdiff_eq_self_iff_disjoint' : x \ y = x ↔ Disjoint x y := by rw [sdiff_eq_self_iff_disjoint, disjoint_comm] #align sdiff_eq_self_iff_disjoint' sdiff_eq_self_iff_disjoint'	Mathlib/Order/BooleanAlgebra.lean	319	322	theorem sdiff_lt (hx : y ≤ x) (hy : y ≠ ⊥) : x \ y < x := by	refine sdiff_le.lt_of_ne fun h => hy ?_ rw [sdiff_eq_self_iff_disjoint', disjoint_iff] at h rw [← h, inf_eq_right.mpr hx]
import Mathlib.Analysis.SpecialFunctions.Trigonometric.Basic import Mathlib.Topology.Order.ProjIcc #align_import analysis.special_functions.trigonometric.inverse from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" noncomputable section open scoped Classical open Topology Filter open Set Filter open Real namespace Real variable {x y : ℝ} -- @[pp_nodot] Porting note: not implemented noncomputable def arcsin : ℝ → ℝ := Subtype.val ∘ IccExtend (neg_le_self zero_le_one) sinOrderIso.symm #align real.arcsin Real.arcsin theorem arcsin_mem_Icc (x : ℝ) : arcsin x ∈ Icc (-(π / 2)) (π / 2) := Subtype.coe_prop _ #align real.arcsin_mem_Icc Real.arcsin_mem_Icc @[simp] theorem range_arcsin : range arcsin = Icc (-(π / 2)) (π / 2) := by rw [arcsin, range_comp Subtype.val] simp [Icc] #align real.range_arcsin Real.range_arcsin theorem arcsin_le_pi_div_two (x : ℝ) : arcsin x ≤ π / 2 := (arcsin_mem_Icc x).2 #align real.arcsin_le_pi_div_two Real.arcsin_le_pi_div_two theorem neg_pi_div_two_le_arcsin (x : ℝ) : -(π / 2) ≤ arcsin x := (arcsin_mem_Icc x).1 #align real.neg_pi_div_two_le_arcsin Real.neg_pi_div_two_le_arcsin theorem arcsin_projIcc (x : ℝ) : arcsin (projIcc (-1) 1 (neg_le_self zero_le_one) x) = arcsin x := by rw [arcsin, Function.comp_apply, IccExtend_val, Function.comp_apply, IccExtend, Function.comp_apply] #align real.arcsin_proj_Icc Real.arcsin_projIcc theorem sin_arcsin' {x : ℝ} (hx : x ∈ Icc (-1 : ℝ) 1) : sin (arcsin x) = x := by simpa [arcsin, IccExtend_of_mem _ _ hx, -OrderIso.apply_symm_apply] using Subtype.ext_iff.1 (sinOrderIso.apply_symm_apply ⟨x, hx⟩) #align real.sin_arcsin' Real.sin_arcsin' theorem sin_arcsin {x : ℝ} (hx₁ : -1 ≤ x) (hx₂ : x ≤ 1) : sin (arcsin x) = x := sin_arcsin' ⟨hx₁, hx₂⟩ #align real.sin_arcsin Real.sin_arcsin theorem arcsin_sin' {x : ℝ} (hx : x ∈ Icc (-(π / 2)) (π / 2)) : arcsin (sin x) = x := injOn_sin (arcsin_mem_Icc _) hx <\| by rw [sin_arcsin (neg_one_le_sin _) (sin_le_one _)] #align real.arcsin_sin' Real.arcsin_sin' theorem arcsin_sin {x : ℝ} (hx₁ : -(π / 2) ≤ x) (hx₂ : x ≤ π / 2) : arcsin (sin x) = x := arcsin_sin' ⟨hx₁, hx₂⟩ #align real.arcsin_sin Real.arcsin_sin theorem strictMonoOn_arcsin : StrictMonoOn arcsin (Icc (-1) 1) := (Subtype.strictMono_coe _).comp_strictMonoOn <\| sinOrderIso.symm.strictMono.strictMonoOn_IccExtend _ #align real.strict_mono_on_arcsin Real.strictMonoOn_arcsin theorem monotone_arcsin : Monotone arcsin := (Subtype.mono_coe _).comp <\| sinOrderIso.symm.monotone.IccExtend _ #align real.monotone_arcsin Real.monotone_arcsin theorem injOn_arcsin : InjOn arcsin (Icc (-1) 1) := strictMonoOn_arcsin.injOn #align real.inj_on_arcsin Real.injOn_arcsin theorem arcsin_inj {x y : ℝ} (hx₁ : -1 ≤ x) (hx₂ : x ≤ 1) (hy₁ : -1 ≤ y) (hy₂ : y ≤ 1) : arcsin x = arcsin y ↔ x = y := injOn_arcsin.eq_iff ⟨hx₁, hx₂⟩ ⟨hy₁, hy₂⟩ #align real.arcsin_inj Real.arcsin_inj @[continuity] theorem continuous_arcsin : Continuous arcsin := continuous_subtype_val.comp sinOrderIso.symm.continuous.Icc_extend' #align real.continuous_arcsin Real.continuous_arcsin theorem continuousAt_arcsin {x : ℝ} : ContinuousAt arcsin x := continuous_arcsin.continuousAt #align real.continuous_at_arcsin Real.continuousAt_arcsin theorem arcsin_eq_of_sin_eq {x y : ℝ} (h₁ : sin x = y) (h₂ : x ∈ Icc (-(π / 2)) (π / 2)) : arcsin y = x := by subst y exact injOn_sin (arcsin_mem_Icc _) h₂ (sin_arcsin' (sin_mem_Icc x)) #align real.arcsin_eq_of_sin_eq Real.arcsin_eq_of_sin_eq @[simp] theorem arcsin_zero : arcsin 0 = 0 := arcsin_eq_of_sin_eq sin_zero ⟨neg_nonpos.2 pi_div_two_pos.le, pi_div_two_pos.le⟩ #align real.arcsin_zero Real.arcsin_zero @[simp] theorem arcsin_one : arcsin 1 = π / 2 := arcsin_eq_of_sin_eq sin_pi_div_two <\| right_mem_Icc.2 (neg_le_self pi_div_two_pos.le) #align real.arcsin_one Real.arcsin_one theorem arcsin_of_one_le {x : ℝ} (hx : 1 ≤ x) : arcsin x = π / 2 := by rw [← arcsin_projIcc, projIcc_of_right_le _ hx, Subtype.coe_mk, arcsin_one] #align real.arcsin_of_one_le Real.arcsin_of_one_le theorem arcsin_neg_one : arcsin (-1) = -(π / 2) := arcsin_eq_of_sin_eq (by rw [sin_neg, sin_pi_div_two]) <\| left_mem_Icc.2 (neg_le_self pi_div_two_pos.le) #align real.arcsin_neg_one Real.arcsin_neg_one theorem arcsin_of_le_neg_one {x : ℝ} (hx : x ≤ -1) : arcsin x = -(π / 2) := by rw [← arcsin_projIcc, projIcc_of_le_left _ hx, Subtype.coe_mk, arcsin_neg_one] #align real.arcsin_of_le_neg_one Real.arcsin_of_le_neg_one @[simp] theorem arcsin_neg (x : ℝ) : arcsin (-x) = -arcsin x := by rcases le_total x (-1) with hx₁ \| hx₁ · rw [arcsin_of_le_neg_one hx₁, neg_neg, arcsin_of_one_le (le_neg.2 hx₁)] rcases le_total 1 x with hx₂ \| hx₂ · rw [arcsin_of_one_le hx₂, arcsin_of_le_neg_one (neg_le_neg hx₂)] refine arcsin_eq_of_sin_eq ?_ ?_ · rw [sin_neg, sin_arcsin hx₁ hx₂] · exact ⟨neg_le_neg (arcsin_le_pi_div_two _), neg_le.2 (neg_pi_div_two_le_arcsin _)⟩ #align real.arcsin_neg Real.arcsin_neg theorem arcsin_le_iff_le_sin {x y : ℝ} (hx : x ∈ Icc (-1 : ℝ) 1) (hy : y ∈ Icc (-(π / 2)) (π / 2)) : arcsin x ≤ y ↔ x ≤ sin y := by rw [← arcsin_sin' hy, strictMonoOn_arcsin.le_iff_le hx (sin_mem_Icc _), arcsin_sin' hy] #align real.arcsin_le_iff_le_sin Real.arcsin_le_iff_le_sin theorem arcsin_le_iff_le_sin' {x y : ℝ} (hy : y ∈ Ico (-(π / 2)) (π / 2)) : arcsin x ≤ y ↔ x ≤ sin y := by rcases le_total x (-1) with hx₁ \| hx₁ · simp [arcsin_of_le_neg_one hx₁, hy.1, hx₁.trans (neg_one_le_sin _)] cases' lt_or_le 1 x with hx₂ hx₂ · simp [arcsin_of_one_le hx₂.le, hy.2.not_le, (sin_le_one y).trans_lt hx₂] exact arcsin_le_iff_le_sin ⟨hx₁, hx₂⟩ (mem_Icc_of_Ico hy) #align real.arcsin_le_iff_le_sin' Real.arcsin_le_iff_le_sin' theorem le_arcsin_iff_sin_le {x y : ℝ} (hx : x ∈ Icc (-(π / 2)) (π / 2)) (hy : y ∈ Icc (-1 : ℝ) 1) : x ≤ arcsin y ↔ sin x ≤ y := by rw [← neg_le_neg_iff, ← arcsin_neg, arcsin_le_iff_le_sin ⟨neg_le_neg hy.2, neg_le.2 hy.1⟩ ⟨neg_le_neg hx.2, neg_le.2 hx.1⟩, sin_neg, neg_le_neg_iff] #align real.le_arcsin_iff_sin_le Real.le_arcsin_iff_sin_le theorem le_arcsin_iff_sin_le' {x y : ℝ} (hx : x ∈ Ioc (-(π / 2)) (π / 2)) : x ≤ arcsin y ↔ sin x ≤ y := by rw [← neg_le_neg_iff, ← arcsin_neg, arcsin_le_iff_le_sin' ⟨neg_le_neg hx.2, neg_lt.2 hx.1⟩, sin_neg, neg_le_neg_iff] #align real.le_arcsin_iff_sin_le' Real.le_arcsin_iff_sin_le' theorem arcsin_lt_iff_lt_sin {x y : ℝ} (hx : x ∈ Icc (-1 : ℝ) 1) (hy : y ∈ Icc (-(π / 2)) (π / 2)) : arcsin x < y ↔ x < sin y := not_le.symm.trans <\| (not_congr <\| le_arcsin_iff_sin_le hy hx).trans not_le #align real.arcsin_lt_iff_lt_sin Real.arcsin_lt_iff_lt_sin theorem arcsin_lt_iff_lt_sin' {x y : ℝ} (hy : y ∈ Ioc (-(π / 2)) (π / 2)) : arcsin x < y ↔ x < sin y := not_le.symm.trans <\| (not_congr <\| le_arcsin_iff_sin_le' hy).trans not_le #align real.arcsin_lt_iff_lt_sin' Real.arcsin_lt_iff_lt_sin' theorem lt_arcsin_iff_sin_lt {x y : ℝ} (hx : x ∈ Icc (-(π / 2)) (π / 2)) (hy : y ∈ Icc (-1 : ℝ) 1) : x < arcsin y ↔ sin x < y := not_le.symm.trans <\| (not_congr <\| arcsin_le_iff_le_sin hy hx).trans not_le #align real.lt_arcsin_iff_sin_lt Real.lt_arcsin_iff_sin_lt theorem lt_arcsin_iff_sin_lt' {x y : ℝ} (hx : x ∈ Ico (-(π / 2)) (π / 2)) : x < arcsin y ↔ sin x < y := not_le.symm.trans <\| (not_congr <\| arcsin_le_iff_le_sin' hx).trans not_le #align real.lt_arcsin_iff_sin_lt' Real.lt_arcsin_iff_sin_lt' theorem arcsin_eq_iff_eq_sin {x y : ℝ} (hy : y ∈ Ioo (-(π / 2)) (π / 2)) : arcsin x = y ↔ x = sin y := by simp only [le_antisymm_iff, arcsin_le_iff_le_sin' (mem_Ico_of_Ioo hy), le_arcsin_iff_sin_le' (mem_Ioc_of_Ioo hy)] #align real.arcsin_eq_iff_eq_sin Real.arcsin_eq_iff_eq_sin @[simp] theorem arcsin_nonneg {x : ℝ} : 0 ≤ arcsin x ↔ 0 ≤ x := (le_arcsin_iff_sin_le' ⟨neg_lt_zero.2 pi_div_two_pos, pi_div_two_pos.le⟩).trans <\| by rw [sin_zero] #align real.arcsin_nonneg Real.arcsin_nonneg @[simp] theorem arcsin_nonpos {x : ℝ} : arcsin x ≤ 0 ↔ x ≤ 0 := neg_nonneg.symm.trans <\| arcsin_neg x ▸ arcsin_nonneg.trans neg_nonneg #align real.arcsin_nonpos Real.arcsin_nonpos @[simp] theorem arcsin_eq_zero_iff {x : ℝ} : arcsin x = 0 ↔ x = 0 := by simp [le_antisymm_iff] #align real.arcsin_eq_zero_iff Real.arcsin_eq_zero_iff @[simp] theorem zero_eq_arcsin_iff {x} : 0 = arcsin x ↔ x = 0 := eq_comm.trans arcsin_eq_zero_iff #align real.zero_eq_arcsin_iff Real.zero_eq_arcsin_iff @[simp] theorem arcsin_pos {x : ℝ} : 0 < arcsin x ↔ 0 < x := lt_iff_lt_of_le_iff_le arcsin_nonpos #align real.arcsin_pos Real.arcsin_pos @[simp] theorem arcsin_lt_zero {x : ℝ} : arcsin x < 0 ↔ x < 0 := lt_iff_lt_of_le_iff_le arcsin_nonneg #align real.arcsin_lt_zero Real.arcsin_lt_zero @[simp] theorem arcsin_lt_pi_div_two {x : ℝ} : arcsin x < π / 2 ↔ x < 1 := (arcsin_lt_iff_lt_sin' (right_mem_Ioc.2 <\| neg_lt_self pi_div_two_pos)).trans <\| by rw [sin_pi_div_two] #align real.arcsin_lt_pi_div_two Real.arcsin_lt_pi_div_two @[simp] theorem neg_pi_div_two_lt_arcsin {x : ℝ} : -(π / 2) < arcsin x ↔ -1 < x := (lt_arcsin_iff_sin_lt' <\| left_mem_Ico.2 <\| neg_lt_self pi_div_two_pos).trans <\| by rw [sin_neg, sin_pi_div_two] #align real.neg_pi_div_two_lt_arcsin Real.neg_pi_div_two_lt_arcsin @[simp] theorem arcsin_eq_pi_div_two {x : ℝ} : arcsin x = π / 2 ↔ 1 ≤ x := ⟨fun h => not_lt.1 fun h' => (arcsin_lt_pi_div_two.2 h').ne h, arcsin_of_one_le⟩ #align real.arcsin_eq_pi_div_two Real.arcsin_eq_pi_div_two @[simp] theorem pi_div_two_eq_arcsin {x} : π / 2 = arcsin x ↔ 1 ≤ x := eq_comm.trans arcsin_eq_pi_div_two #align real.pi_div_two_eq_arcsin Real.pi_div_two_eq_arcsin @[simp] theorem pi_div_two_le_arcsin {x} : π / 2 ≤ arcsin x ↔ 1 ≤ x := (arcsin_le_pi_div_two x).le_iff_eq.trans pi_div_two_eq_arcsin #align real.pi_div_two_le_arcsin Real.pi_div_two_le_arcsin @[simp] theorem arcsin_eq_neg_pi_div_two {x : ℝ} : arcsin x = -(π / 2) ↔ x ≤ -1 := ⟨fun h => not_lt.1 fun h' => (neg_pi_div_two_lt_arcsin.2 h').ne' h, arcsin_of_le_neg_one⟩ #align real.arcsin_eq_neg_pi_div_two Real.arcsin_eq_neg_pi_div_two @[simp] theorem neg_pi_div_two_eq_arcsin {x} : -(π / 2) = arcsin x ↔ x ≤ -1 := eq_comm.trans arcsin_eq_neg_pi_div_two #align real.neg_pi_div_two_eq_arcsin Real.neg_pi_div_two_eq_arcsin @[simp] theorem arcsin_le_neg_pi_div_two {x} : arcsin x ≤ -(π / 2) ↔ x ≤ -1 := (neg_pi_div_two_le_arcsin x).le_iff_eq.trans arcsin_eq_neg_pi_div_two #align real.arcsin_le_neg_pi_div_two Real.arcsin_le_neg_pi_div_two @[simp] theorem pi_div_four_le_arcsin {x} : π / 4 ≤ arcsin x ↔ √2 / 2 ≤ x := by rw [← sin_pi_div_four, le_arcsin_iff_sin_le'] have := pi_pos constructor <;> linarith #align real.pi_div_four_le_arcsin Real.pi_div_four_le_arcsin theorem mapsTo_sin_Ioo : MapsTo sin (Ioo (-(π / 2)) (π / 2)) (Ioo (-1) 1) := fun x h => by rwa [mem_Ioo, ← arcsin_lt_pi_div_two, ← neg_pi_div_two_lt_arcsin, arcsin_sin h.1.le h.2.le] #align real.maps_to_sin_Ioo Real.mapsTo_sin_Ioo @[simp] def sinPartialHomeomorph : PartialHomeomorph ℝ ℝ where toFun := sin invFun := arcsin source := Ioo (-(π / 2)) (π / 2) target := Ioo (-1) 1 map_source' := mapsTo_sin_Ioo map_target' _ hy := ⟨neg_pi_div_two_lt_arcsin.2 hy.1, arcsin_lt_pi_div_two.2 hy.2⟩ left_inv' _ hx := arcsin_sin hx.1.le hx.2.le right_inv' _ hy := sin_arcsin hy.1.le hy.2.le open_source := isOpen_Ioo open_target := isOpen_Ioo continuousOn_toFun := continuous_sin.continuousOn continuousOn_invFun := continuous_arcsin.continuousOn #align real.sin_local_homeomorph Real.sinPartialHomeomorph theorem cos_arcsin_nonneg (x : ℝ) : 0 ≤ cos (arcsin x) := cos_nonneg_of_mem_Icc ⟨neg_pi_div_two_le_arcsin _, arcsin_le_pi_div_two _⟩ #align real.cos_arcsin_nonneg Real.cos_arcsin_nonneg -- The junk values for `arcsin` and `sqrt` make this true even outside `[-1, 1]`. theorem cos_arcsin (x : ℝ) : cos (arcsin x) = √(1 - x ^ 2) := by by_cases hx₁ : -1 ≤ x; swap · rw [not_le] at hx₁ rw [arcsin_of_le_neg_one hx₁.le, cos_neg, cos_pi_div_two, sqrt_eq_zero_of_nonpos] nlinarith by_cases hx₂ : x ≤ 1; swap · rw [not_le] at hx₂ rw [arcsin_of_one_le hx₂.le, cos_pi_div_two, sqrt_eq_zero_of_nonpos] nlinarith have : sin (arcsin x) ^ 2 + cos (arcsin x) ^ 2 = 1 := sin_sq_add_cos_sq (arcsin x) rw [← eq_sub_iff_add_eq', ← sqrt_inj (sq_nonneg _) (sub_nonneg.2 (sin_sq_le_one (arcsin x))), sq, sqrt_mul_self (cos_arcsin_nonneg _)] at this rw [this, sin_arcsin hx₁ hx₂] #align real.cos_arcsin Real.cos_arcsin -- The junk values for `arcsin` and `sqrt` make this true even outside `[-1, 1]`. theorem tan_arcsin (x : ℝ) : tan (arcsin x) = x / √(1 - x ^ 2) := by rw [tan_eq_sin_div_cos, cos_arcsin] by_cases hx₁ : -1 ≤ x; swap · have h : √(1 - x ^ 2) = 0 := sqrt_eq_zero_of_nonpos (by nlinarith) rw [h] simp by_cases hx₂ : x ≤ 1; swap · have h : √(1 - x ^ 2) = 0 := sqrt_eq_zero_of_nonpos (by nlinarith) rw [h] simp rw [sin_arcsin hx₁ hx₂] #align real.tan_arcsin Real.tan_arcsin -- @[pp_nodot] Porting note: not implemented noncomputable def arccos (x : ℝ) : ℝ := π / 2 - arcsin x #align real.arccos Real.arccos theorem arccos_eq_pi_div_two_sub_arcsin (x : ℝ) : arccos x = π / 2 - arcsin x := rfl #align real.arccos_eq_pi_div_two_sub_arcsin Real.arccos_eq_pi_div_two_sub_arcsin theorem arcsin_eq_pi_div_two_sub_arccos (x : ℝ) : arcsin x = π / 2 - arccos x := by simp [arccos] #align real.arcsin_eq_pi_div_two_sub_arccos Real.arcsin_eq_pi_div_two_sub_arccos theorem arccos_le_pi (x : ℝ) : arccos x ≤ π := by unfold arccos; linarith [neg_pi_div_two_le_arcsin x] #align real.arccos_le_pi Real.arccos_le_pi theorem arccos_nonneg (x : ℝ) : 0 ≤ arccos x := by unfold arccos; linarith [arcsin_le_pi_div_two x] #align real.arccos_nonneg Real.arccos_nonneg @[simp] theorem arccos_pos {x : ℝ} : 0 < arccos x ↔ x < 1 := by simp [arccos] #align real.arccos_pos Real.arccos_pos theorem cos_arccos {x : ℝ} (hx₁ : -1 ≤ x) (hx₂ : x ≤ 1) : cos (arccos x) = x := by rw [arccos, cos_pi_div_two_sub, sin_arcsin hx₁ hx₂] #align real.cos_arccos Real.cos_arccos theorem arccos_cos {x : ℝ} (hx₁ : 0 ≤ x) (hx₂ : x ≤ π) : arccos (cos x) = x := by rw [arccos, ← sin_pi_div_two_sub, arcsin_sin] <;> simp [sub_eq_add_neg] <;> linarith #align real.arccos_cos Real.arccos_cos lemma arccos_eq_of_eq_cos (hy₀ : 0 ≤ y) (hy₁ : y ≤ π) (hxy : x = cos y) : arccos x = y := by rw [hxy, arccos_cos hy₀ hy₁] theorem strictAntiOn_arccos : StrictAntiOn arccos (Icc (-1) 1) := fun _ hx _ hy h => sub_lt_sub_left (strictMonoOn_arcsin hx hy h) _ #align real.strict_anti_on_arccos Real.strictAntiOn_arccos theorem arccos_injOn : InjOn arccos (Icc (-1) 1) := strictAntiOn_arccos.injOn #align real.arccos_inj_on Real.arccos_injOn theorem arccos_inj {x y : ℝ} (hx₁ : -1 ≤ x) (hx₂ : x ≤ 1) (hy₁ : -1 ≤ y) (hy₂ : y ≤ 1) : arccos x = arccos y ↔ x = y := arccos_injOn.eq_iff ⟨hx₁, hx₂⟩ ⟨hy₁, hy₂⟩ #align real.arccos_inj Real.arccos_inj @[simp] theorem arccos_zero : arccos 0 = π / 2 := by simp [arccos] #align real.arccos_zero Real.arccos_zero @[simp] theorem arccos_one : arccos 1 = 0 := by simp [arccos] #align real.arccos_one Real.arccos_one @[simp] theorem arccos_neg_one : arccos (-1) = π := by simp [arccos, add_halves] #align real.arccos_neg_one Real.arccos_neg_one @[simp] theorem arccos_eq_zero {x} : arccos x = 0 ↔ 1 ≤ x := by simp [arccos, sub_eq_zero] #align real.arccos_eq_zero Real.arccos_eq_zero @[simp]	Mathlib/Analysis/SpecialFunctions/Trigonometric/Inverse.lean	402	402	theorem arccos_eq_pi_div_two {x} : arccos x = π / 2 ↔ x = 0 := by	simp [arccos]
import Mathlib.Algebra.Group.Indicator import Mathlib.Data.Finset.Piecewise import Mathlib.Data.Finset.Preimage #align_import algebra.big_operators.basic from "leanprover-community/mathlib"@"65a1391a0106c9204fe45bc73a039f056558cb83" -- TODO -- assert_not_exists AddCommMonoidWithOne assert_not_exists MonoidWithZero assert_not_exists MulAction variable {ι κ α β γ : Type} open Fin Function library_note "operator precedence of big operators" @[to_additive (attr := simp)] theorem map_prod [CommMonoid β] [CommMonoid γ] {G : Type} [FunLike G β γ] [MonoidHomClass G β γ] (g : G) (f : α → β) (s : Finset α) : g (∏ x ∈ s, f x) = ∏ x ∈ s, g (f x) := by simp only [Finset.prod_eq_multiset_prod, map_multiset_prod, Multiset.map_map]; rfl #align map_prod map_prod #align map_sum map_sum @[to_additive] theorem MonoidHom.coe_finset_prod [MulOneClass β] [CommMonoid γ] (f : α → β →* γ) (s : Finset α) : ⇑(∏ x ∈ s, f x) = ∏ x ∈ s, ⇑(f x) := map_prod (MonoidHom.coeFn β γ) _ _ #align monoid_hom.coe_finset_prod MonoidHom.coe_finset_prod #align add_monoid_hom.coe_finset_sum AddMonoidHom.coe_finset_sum @[to_additive (attr := simp) "See also `Finset.sum_apply`, with the same conclusion but with the weaker hypothesis `f : α → β → γ`"] theorem MonoidHom.finset_prod_apply [MulOneClass β] [CommMonoid γ] (f : α → β →* γ) (s : Finset α) (b : β) : (∏ x ∈ s, f x) b = ∏ x ∈ s, f x b := map_prod (MonoidHom.eval b) _ _ #align monoid_hom.finset_prod_apply MonoidHom.finset_prod_apply #align add_monoid_hom.finset_sum_apply AddMonoidHom.finset_sum_apply variable {s s₁ s₂ : Finset α} {a : α} {f g : α → β} namespace Finset section CommMonoid variable [CommMonoid β] @[to_additive (attr := simp)] theorem prod_empty : ∏ x ∈ ∅, f x = 1 := rfl #align finset.prod_empty Finset.prod_empty #align finset.sum_empty Finset.sum_empty @[to_additive] theorem prod_of_empty [IsEmpty α] (s : Finset α) : ∏ i ∈ s, f i = 1 := by rw [eq_empty_of_isEmpty s, prod_empty] #align finset.prod_of_empty Finset.prod_of_empty #align finset.sum_of_empty Finset.sum_of_empty @[to_additive (attr := simp)] theorem prod_cons (h : a ∉ s) : ∏ x ∈ cons a s h, f x = f a * ∏ x ∈ s, f x := fold_cons h #align finset.prod_cons Finset.prod_cons #align finset.sum_cons Finset.sum_cons @[to_additive (attr := simp)] theorem prod_insert [DecidableEq α] : a ∉ s → ∏ x ∈ insert a s, f x = f a * ∏ x ∈ s, f x := fold_insert #align finset.prod_insert Finset.prod_insert #align finset.sum_insert Finset.sum_insert @[to_additive (attr := simp) "The sum of `f` over `insert a s` is the same as the sum over `s`, as long as `a` is in `s` or `f a = 0`."] theorem prod_insert_of_eq_one_if_not_mem [DecidableEq α] (h : a ∉ s → f a = 1) : ∏ x ∈ insert a s, f x = ∏ x ∈ s, f x := by by_cases hm : a ∈ s · simp_rw [insert_eq_of_mem hm] · rw [prod_insert hm, h hm, one_mul] #align finset.prod_insert_of_eq_one_if_not_mem Finset.prod_insert_of_eq_one_if_not_mem #align finset.sum_insert_of_eq_zero_if_not_mem Finset.sum_insert_of_eq_zero_if_not_mem @[to_additive (attr := simp) "The sum of `f` over `insert a s` is the same as the sum over `s`, as long as `f a = 0`."] theorem prod_insert_one [DecidableEq α] (h : f a = 1) : ∏ x ∈ insert a s, f x = ∏ x ∈ s, f x := prod_insert_of_eq_one_if_not_mem fun _ => h #align finset.prod_insert_one Finset.prod_insert_one #align finset.sum_insert_zero Finset.sum_insert_zero @[to_additive] theorem prod_insert_div {M : Type} [CommGroup M] [DecidableEq α] (ha : a ∉ s) {f : α → M} : (∏ x ∈ insert a s, f x) / f a = ∏ x ∈ s, f x := by simp [ha] @[to_additive (attr := simp)] theorem prod_singleton (f : α → β) (a : α) : ∏ x ∈ singleton a, f x = f a := Eq.trans fold_singleton <\| mul_one _ #align finset.prod_singleton Finset.prod_singleton #align finset.sum_singleton Finset.sum_singleton @[to_additive] theorem prod_pair [DecidableEq α] {a b : α} (h : a ≠ b) : (∏ x ∈ ({a, b} : Finset α), f x) = f a f b := by rw [prod_insert (not_mem_singleton.2 h), prod_singleton] #align finset.prod_pair Finset.prod_pair #align finset.sum_pair Finset.sum_pair @[to_additive (attr := simp)] theorem prod_const_one : (∏ _x ∈ s, (1 : β)) = 1 := by simp only [Finset.prod, Multiset.map_const', Multiset.prod_replicate, one_pow] #align finset.prod_const_one Finset.prod_const_one #align finset.sum_const_zero Finset.sum_const_zero @[to_additive (attr := simp)] theorem prod_image [DecidableEq α] {s : Finset γ} {g : γ → α} : (∀ x ∈ s, ∀ y ∈ s, g x = g y → x = y) → ∏ x ∈ s.image g, f x = ∏ x ∈ s, f (g x) := fold_image #align finset.prod_image Finset.prod_image #align finset.sum_image Finset.sum_image @[to_additive (attr := simp)] theorem prod_map (s : Finset α) (e : α ↪ γ) (f : γ → β) : ∏ x ∈ s.map e, f x = ∏ x ∈ s, f (e x) := by rw [Finset.prod, Finset.map_val, Multiset.map_map]; rfl #align finset.prod_map Finset.prod_map #align finset.sum_map Finset.sum_map @[to_additive] lemma prod_attach (s : Finset α) (f : α → β) : ∏ x ∈ s.attach, f x = ∏ x ∈ s, f x := by classical rw [← prod_image Subtype.coe_injective.injOn, attach_image_val] #align finset.prod_attach Finset.prod_attach #align finset.sum_attach Finset.sum_attach @[to_additive (attr := congr)] theorem prod_congr (h : s₁ = s₂) : (∀ x ∈ s₂, f x = g x) → s₁.prod f = s₂.prod g := by rw [h]; exact fold_congr #align finset.prod_congr Finset.prod_congr #align finset.sum_congr Finset.sum_congr @[to_additive] theorem prod_eq_one {f : α → β} {s : Finset α} (h : ∀ x ∈ s, f x = 1) : ∏ x ∈ s, f x = 1 := calc ∏ x ∈ s, f x = ∏ _x ∈ s, 1 := Finset.prod_congr rfl h _ = 1 := Finset.prod_const_one #align finset.prod_eq_one Finset.prod_eq_one #align finset.sum_eq_zero Finset.sum_eq_zero @[to_additive] theorem prod_disjUnion (h) : ∏ x ∈ s₁.disjUnion s₂ h, f x = (∏ x ∈ s₁, f x) * ∏ x ∈ s₂, f x := by refine Eq.trans ?_ (fold_disjUnion h) rw [one_mul] rfl #align finset.prod_disj_union Finset.prod_disjUnion #align finset.sum_disj_union Finset.sum_disjUnion @[to_additive] theorem prod_disjiUnion (s : Finset ι) (t : ι → Finset α) (h) : ∏ x ∈ s.disjiUnion t h, f x = ∏ i ∈ s, ∏ x ∈ t i, f x := by refine Eq.trans ?_ (fold_disjiUnion h) dsimp [Finset.prod, Multiset.prod, Multiset.fold, Finset.disjUnion, Finset.fold] congr exact prod_const_one.symm #align finset.prod_disj_Union Finset.prod_disjiUnion #align finset.sum_disj_Union Finset.sum_disjiUnion @[to_additive] theorem prod_union_inter [DecidableEq α] : (∏ x ∈ s₁ ∪ s₂, f x) * ∏ x ∈ s₁ ∩ s₂, f x = (∏ x ∈ s₁, f x) * ∏ x ∈ s₂, f x := fold_union_inter #align finset.prod_union_inter Finset.prod_union_inter #align finset.sum_union_inter Finset.sum_union_inter @[to_additive] theorem prod_union [DecidableEq α] (h : Disjoint s₁ s₂) : ∏ x ∈ s₁ ∪ s₂, f x = (∏ x ∈ s₁, f x) * ∏ x ∈ s₂, f x := by rw [← prod_union_inter, disjoint_iff_inter_eq_empty.mp h]; exact (mul_one _).symm #align finset.prod_union Finset.prod_union #align finset.sum_union Finset.sum_union @[to_additive] theorem prod_filter_mul_prod_filter_not (s : Finset α) (p : α → Prop) [DecidablePred p] [∀ x, Decidable (¬p x)] (f : α → β) : (∏ x ∈ s.filter p, f x) * ∏ x ∈ s.filter fun x => ¬p x, f x = ∏ x ∈ s, f x := by have := Classical.decEq α rw [← prod_union (disjoint_filter_filter_neg s s p), filter_union_filter_neg_eq] #align finset.prod_filter_mul_prod_filter_not Finset.prod_filter_mul_prod_filter_not #align finset.sum_filter_add_sum_filter_not Finset.sum_filter_add_sum_filter_not section open Finset variable [Fintype α] [CommMonoid β] @[to_additive] theorem IsCompl.prod_mul_prod {s t : Finset α} (h : IsCompl s t) (f : α → β) : (∏ i ∈ s, f i) * ∏ i ∈ t, f i = ∏ i, f i := (Finset.prod_disjUnion h.disjoint).symm.trans <\| by classical rw [Finset.disjUnion_eq_union, ← Finset.sup_eq_union, h.sup_eq_top]; rfl #align is_compl.prod_mul_prod IsCompl.prod_mul_prod #align is_compl.sum_add_sum IsCompl.sum_add_sum end namespace Finset section CommMonoid variable [CommMonoid β] @[to_additive "Adding the sums of a function over `s` and over `sᶜ` gives the whole sum. For a version expressed with subtypes, see `Fintype.sum_subtype_add_sum_subtype`. "] theorem prod_mul_prod_compl [Fintype α] [DecidableEq α] (s : Finset α) (f : α → β) : (∏ i ∈ s, f i) * ∏ i ∈ sᶜ, f i = ∏ i, f i := IsCompl.prod_mul_prod isCompl_compl f #align finset.prod_mul_prod_compl Finset.prod_mul_prod_compl #align finset.sum_add_sum_compl Finset.sum_add_sum_compl @[to_additive] theorem prod_compl_mul_prod [Fintype α] [DecidableEq α] (s : Finset α) (f : α → β) : (∏ i ∈ sᶜ, f i) * ∏ i ∈ s, f i = ∏ i, f i := (@isCompl_compl _ s _).symm.prod_mul_prod f #align finset.prod_compl_mul_prod Finset.prod_compl_mul_prod #align finset.sum_compl_add_sum Finset.sum_compl_add_sum @[to_additive] theorem prod_sdiff [DecidableEq α] (h : s₁ ⊆ s₂) : (∏ x ∈ s₂ \ s₁, f x) * ∏ x ∈ s₁, f x = ∏ x ∈ s₂, f x := by rw [← prod_union sdiff_disjoint, sdiff_union_of_subset h] #align finset.prod_sdiff Finset.prod_sdiff #align finset.sum_sdiff Finset.sum_sdiff @[to_additive] theorem prod_subset_one_on_sdiff [DecidableEq α] (h : s₁ ⊆ s₂) (hg : ∀ x ∈ s₂ \ s₁, g x = 1) (hfg : ∀ x ∈ s₁, f x = g x) : ∏ i ∈ s₁, f i = ∏ i ∈ s₂, g i := by rw [← prod_sdiff h, prod_eq_one hg, one_mul] exact prod_congr rfl hfg #align finset.prod_subset_one_on_sdiff Finset.prod_subset_one_on_sdiff #align finset.sum_subset_zero_on_sdiff Finset.sum_subset_zero_on_sdiff @[to_additive] theorem prod_subset (h : s₁ ⊆ s₂) (hf : ∀ x ∈ s₂, x ∉ s₁ → f x = 1) : ∏ x ∈ s₁, f x = ∏ x ∈ s₂, f x := haveI := Classical.decEq α prod_subset_one_on_sdiff h (by simpa) fun _ _ => rfl #align finset.prod_subset Finset.prod_subset #align finset.sum_subset Finset.sum_subset @[to_additive (attr := simp)] theorem prod_disj_sum (s : Finset α) (t : Finset γ) (f : Sum α γ → β) : ∏ x ∈ s.disjSum t, f x = (∏ x ∈ s, f (Sum.inl x)) * ∏ x ∈ t, f (Sum.inr x) := by rw [← map_inl_disjUnion_map_inr, prod_disjUnion, prod_map, prod_map] rfl #align finset.prod_disj_sum Finset.prod_disj_sum #align finset.sum_disj_sum Finset.sum_disj_sum @[to_additive] theorem prod_sum_elim (s : Finset α) (t : Finset γ) (f : α → β) (g : γ → β) : ∏ x ∈ s.disjSum t, Sum.elim f g x = (∏ x ∈ s, f x) * ∏ x ∈ t, g x := by simp #align finset.prod_sum_elim Finset.prod_sum_elim #align finset.sum_sum_elim Finset.sum_sum_elim @[to_additive] theorem prod_biUnion [DecidableEq α] {s : Finset γ} {t : γ → Finset α} (hs : Set.PairwiseDisjoint (↑s) t) : ∏ x ∈ s.biUnion t, f x = ∏ x ∈ s, ∏ i ∈ t x, f i := by rw [← disjiUnion_eq_biUnion _ _ hs, prod_disjiUnion] #align finset.prod_bUnion Finset.prod_biUnion #align finset.sum_bUnion Finset.sum_biUnion @[to_additive "Sum over a sigma type equals the sum of fiberwise sums. For rewriting in the reverse direction, use `Finset.sum_sigma'`"] theorem prod_sigma {σ : α → Type} (s : Finset α) (t : ∀ a, Finset (σ a)) (f : Sigma σ → β) : ∏ x ∈ s.sigma t, f x = ∏ a ∈ s, ∏ s ∈ t a, f ⟨a, s⟩ := by simp_rw [← disjiUnion_map_sigma_mk, prod_disjiUnion, prod_map, Function.Embedding.sigmaMk_apply] #align finset.prod_sigma Finset.prod_sigma #align finset.sum_sigma Finset.sum_sigma @[to_additive] theorem prod_sigma' {σ : α → Type} (s : Finset α) (t : ∀ a, Finset (σ a)) (f : ∀ a, σ a → β) : (∏ a ∈ s, ∏ s ∈ t a, f a s) = ∏ x ∈ s.sigma t, f x.1 x.2 := Eq.symm <\| prod_sigma s t fun x => f x.1 x.2 #align finset.prod_sigma' Finset.prod_sigma' #align finset.sum_sigma' Finset.sum_sigma' @[to_additive "Taking a sum over `univ.pi t` is the same as taking the sum over `Fintype.piFinset t`. `univ.pi t` and `Fintype.piFinset t` are essentially the same `Finset`, but differ in the type of their element, `univ.pi t` is a `Finset (Π a ∈ univ, t a)` and `Fintype.piFinset t` is a `Finset (Π a, t a)`."] lemma prod_univ_pi [DecidableEq ι] [Fintype ι] {κ : ι → Type} (t : ∀ i, Finset (κ i)) (f : (∀ i ∈ (univ : Finset ι), κ i) → β) : ∏ x ∈ univ.pi t, f x = ∏ x ∈ Fintype.piFinset t, f fun a _ ↦ x a := by apply prod_nbij' (fun x i ↦ x i $ mem_univ _) (fun x i _ ↦ x i) <;> simp #align finset.prod_univ_pi Finset.prod_univ_pi #align finset.sum_univ_pi Finset.sum_univ_pi @[to_additive (attr := simp)] lemma prod_diag [DecidableEq α] (s : Finset α) (f : α × α → β) : ∏ i ∈ s.diag, f i = ∏ i ∈ s, f (i, i) := by apply prod_nbij' Prod.fst (fun i ↦ (i, i)) <;> simp @[to_additive] theorem prod_finset_product (r : Finset (γ × α)) (s : Finset γ) (t : γ → Finset α) (h : ∀ p : γ × α, p ∈ r ↔ p.1 ∈ s ∧ p.2 ∈ t p.1) {f : γ × α → β} : ∏ p ∈ r, f p = ∏ c ∈ s, ∏ a ∈ t c, f (c, a) := by refine Eq.trans ?_ (prod_sigma s t fun p => f (p.1, p.2)) apply prod_equiv (Equiv.sigmaEquivProd _ _).symm <;> simp [h] #align finset.prod_finset_product Finset.prod_finset_product #align finset.sum_finset_product Finset.sum_finset_product @[to_additive] theorem prod_finset_product' (r : Finset (γ × α)) (s : Finset γ) (t : γ → Finset α) (h : ∀ p : γ × α, p ∈ r ↔ p.1 ∈ s ∧ p.2 ∈ t p.1) {f : γ → α → β} : ∏ p ∈ r, f p.1 p.2 = ∏ c ∈ s, ∏ a ∈ t c, f c a := prod_finset_product r s t h #align finset.prod_finset_product' Finset.prod_finset_product' #align finset.sum_finset_product' Finset.sum_finset_product' @[to_additive] theorem prod_finset_product_right (r : Finset (α × γ)) (s : Finset γ) (t : γ → Finset α) (h : ∀ p : α × γ, p ∈ r ↔ p.2 ∈ s ∧ p.1 ∈ t p.2) {f : α × γ → β} : ∏ p ∈ r, f p = ∏ c ∈ s, ∏ a ∈ t c, f (a, c) := by refine Eq.trans ?_ (prod_sigma s t fun p => f (p.2, p.1)) apply prod_equiv ((Equiv.prodComm _ _).trans (Equiv.sigmaEquivProd _ _).symm) <;> simp [h] #align finset.prod_finset_product_right Finset.prod_finset_product_right #align finset.sum_finset_product_right Finset.sum_finset_product_right @[to_additive] theorem prod_finset_product_right' (r : Finset (α × γ)) (s : Finset γ) (t : γ → Finset α) (h : ∀ p : α × γ, p ∈ r ↔ p.2 ∈ s ∧ p.1 ∈ t p.2) {f : α → γ → β} : ∏ p ∈ r, f p.1 p.2 = ∏ c ∈ s, ∏ a ∈ t c, f a c := prod_finset_product_right r s t h #align finset.prod_finset_product_right' Finset.prod_finset_product_right' #align finset.sum_finset_product_right' Finset.sum_finset_product_right' @[to_additive] theorem prod_image' [DecidableEq α] {s : Finset γ} {g : γ → α} (h : γ → β) (eq : ∀ c ∈ s, f (g c) = ∏ x ∈ s.filter fun c' => g c' = g c, h x) : ∏ x ∈ s.image g, f x = ∏ x ∈ s, h x := calc ∏ x ∈ s.image g, f x = ∏ x ∈ s.image g, ∏ x ∈ s.filter fun c' => g c' = x, h x := (prod_congr rfl) fun _x hx => let ⟨c, hcs, hc⟩ := mem_image.1 hx hc ▸ eq c hcs _ = ∏ x ∈ s, h x := prod_fiberwise_of_maps_to (fun _x => mem_image_of_mem g) _ #align finset.prod_image' Finset.prod_image' #align finset.sum_image' Finset.sum_image' @[to_additive] theorem prod_mul_distrib : ∏ x ∈ s, f x g x = (∏ x ∈ s, f x) * ∏ x ∈ s, g x := Eq.trans (by rw [one_mul]; rfl) fold_op_distrib #align finset.prod_mul_distrib Finset.prod_mul_distrib #align finset.sum_add_distrib Finset.sum_add_distrib @[to_additive] lemma prod_mul_prod_comm (f g h i : α → β) : (∏ a ∈ s, f a * g a) * ∏ a ∈ s, h a * i a = (∏ a ∈ s, f a * h a) * ∏ a ∈ s, g a * i a := by simp_rw [prod_mul_distrib, mul_mul_mul_comm] @[to_additive] theorem prod_product {s : Finset γ} {t : Finset α} {f : γ × α → β} : ∏ x ∈ s ×ˢ t, f x = ∏ x ∈ s, ∏ y ∈ t, f (x, y) := prod_finset_product (s ×ˢ t) s (fun _a => t) fun _p => mem_product #align finset.prod_product Finset.prod_product #align finset.sum_product Finset.sum_product @[to_additive "An uncurried version of `Finset.sum_product`"] theorem prod_product' {s : Finset γ} {t : Finset α} {f : γ → α → β} : ∏ x ∈ s ×ˢ t, f x.1 x.2 = ∏ x ∈ s, ∏ y ∈ t, f x y := prod_product #align finset.prod_product' Finset.prod_product' #align finset.sum_product' Finset.sum_product' @[to_additive] theorem prod_product_right {s : Finset γ} {t : Finset α} {f : γ × α → β} : ∏ x ∈ s ×ˢ t, f x = ∏ y ∈ t, ∏ x ∈ s, f (x, y) := prod_finset_product_right (s ×ˢ t) t (fun _a => s) fun _p => mem_product.trans and_comm #align finset.prod_product_right Finset.prod_product_right #align finset.sum_product_right Finset.sum_product_right @[to_additive "An uncurried version of `Finset.sum_product_right`"] theorem prod_product_right' {s : Finset γ} {t : Finset α} {f : γ → α → β} : ∏ x ∈ s ×ˢ t, f x.1 x.2 = ∏ y ∈ t, ∏ x ∈ s, f x y := prod_product_right #align finset.prod_product_right' Finset.prod_product_right' #align finset.sum_product_right' Finset.sum_product_right' @[to_additive "Generalization of `Finset.sum_comm` to the case when the inner `Finset`s depend on the outer variable."] theorem prod_comm' {s : Finset γ} {t : γ → Finset α} {t' : Finset α} {s' : α → Finset γ} (h : ∀ x y, x ∈ s ∧ y ∈ t x ↔ x ∈ s' y ∧ y ∈ t') {f : γ → α → β} : (∏ x ∈ s, ∏ y ∈ t x, f x y) = ∏ y ∈ t', ∏ x ∈ s' y, f x y := by classical have : ∀ z : γ × α, (z ∈ s.biUnion fun x => (t x).map <\| Function.Embedding.sectr x _) ↔ z.1 ∈ s ∧ z.2 ∈ t z.1 := by rintro ⟨x, y⟩ simp only [mem_biUnion, mem_map, Function.Embedding.sectr_apply, Prod.mk.injEq, exists_eq_right, ← and_assoc] exact (prod_finset_product' _ _ _ this).symm.trans ((prod_finset_product_right' _ _ _) fun ⟨x, y⟩ => (this _).trans ((h x y).trans and_comm)) #align finset.prod_comm' Finset.prod_comm' #align finset.sum_comm' Finset.sum_comm' @[to_additive] theorem prod_comm {s : Finset γ} {t : Finset α} {f : γ → α → β} : (∏ x ∈ s, ∏ y ∈ t, f x y) = ∏ y ∈ t, ∏ x ∈ s, f x y := prod_comm' fun _ _ => Iff.rfl #align finset.prod_comm Finset.prod_comm #align finset.sum_comm Finset.sum_comm @[to_additive] theorem prod_hom_rel [CommMonoid γ] {r : β → γ → Prop} {f : α → β} {g : α → γ} {s : Finset α} (h₁ : r 1 1) (h₂ : ∀ a b c, r b c → r (f a * b) (g a * c)) : r (∏ x ∈ s, f x) (∏ x ∈ s, g x) := by delta Finset.prod apply Multiset.prod_hom_rel <;> assumption #align finset.prod_hom_rel Finset.prod_hom_rel #align finset.sum_hom_rel Finset.sum_hom_rel @[to_additive] theorem prod_filter_of_ne {p : α → Prop} [DecidablePred p] (hp : ∀ x ∈ s, f x ≠ 1 → p x) : ∏ x ∈ s.filter p, f x = ∏ x ∈ s, f x := (prod_subset (filter_subset _ _)) fun x => by classical rw [not_imp_comm, mem_filter] exact fun h₁ h₂ => ⟨h₁, by simpa using hp _ h₁ h₂⟩ #align finset.prod_filter_of_ne Finset.prod_filter_of_ne #align finset.sum_filter_of_ne Finset.sum_filter_of_ne -- If we use `[DecidableEq β]` here, some rewrites fail because they find a wrong `Decidable` -- instance first; `{∀ x, Decidable (f x ≠ 1)}` doesn't work with `rw ← prod_filter_ne_one` @[to_additive] theorem prod_filter_ne_one (s : Finset α) [∀ x, Decidable (f x ≠ 1)] : ∏ x ∈ s.filter fun x => f x ≠ 1, f x = ∏ x ∈ s, f x := prod_filter_of_ne fun _ _ => id #align finset.prod_filter_ne_one Finset.prod_filter_ne_one #align finset.sum_filter_ne_zero Finset.sum_filter_ne_zero @[to_additive] theorem prod_filter (p : α → Prop) [DecidablePred p] (f : α → β) : ∏ a ∈ s.filter p, f a = ∏ a ∈ s, if p a then f a else 1 := calc ∏ a ∈ s.filter p, f a = ∏ a ∈ s.filter p, if p a then f a else 1 := prod_congr rfl fun a h => by rw [if_pos]; simpa using (mem_filter.1 h).2 _ = ∏ a ∈ s, if p a then f a else 1 := by { refine prod_subset (filter_subset _ s) fun x hs h => ?_ rw [mem_filter, not_and] at h exact if_neg (by simpa using h hs) } #align finset.prod_filter Finset.prod_filter #align finset.sum_filter Finset.sum_filter @[to_additive] theorem prod_eq_single_of_mem {s : Finset α} {f : α → β} (a : α) (h : a ∈ s) (h₀ : ∀ b ∈ s, b ≠ a → f b = 1) : ∏ x ∈ s, f x = f a := by haveI := Classical.decEq α calc ∏ x ∈ s, f x = ∏ x ∈ {a}, f x := by { refine (prod_subset ?_ ?_).symm · intro _ H rwa [mem_singleton.1 H] · simpa only [mem_singleton] } _ = f a := prod_singleton _ _ #align finset.prod_eq_single_of_mem Finset.prod_eq_single_of_mem #align finset.sum_eq_single_of_mem Finset.sum_eq_single_of_mem @[to_additive] theorem prod_eq_single {s : Finset α} {f : α → β} (a : α) (h₀ : ∀ b ∈ s, b ≠ a → f b = 1) (h₁ : a ∉ s → f a = 1) : ∏ x ∈ s, f x = f a := haveI := Classical.decEq α by_cases (prod_eq_single_of_mem a · h₀) fun this => (prod_congr rfl fun b hb => h₀ b hb <\| by rintro rfl; exact this hb).trans <\| prod_const_one.trans (h₁ this).symm #align finset.prod_eq_single Finset.prod_eq_single #align finset.sum_eq_single Finset.sum_eq_single @[to_additive] lemma prod_union_eq_left [DecidableEq α] (hs : ∀ a ∈ s₂, a ∉ s₁ → f a = 1) : ∏ a ∈ s₁ ∪ s₂, f a = ∏ a ∈ s₁, f a := Eq.symm <\| prod_subset subset_union_left fun _a ha ha' ↦ hs _ ((mem_union.1 ha).resolve_left ha') ha' @[to_additive] lemma prod_union_eq_right [DecidableEq α] (hs : ∀ a ∈ s₁, a ∉ s₂ → f a = 1) : ∏ a ∈ s₁ ∪ s₂, f a = ∏ a ∈ s₂, f a := by rw [union_comm, prod_union_eq_left hs] @[to_additive] theorem prod_eq_mul_of_mem {s : Finset α} {f : α → β} (a b : α) (ha : a ∈ s) (hb : b ∈ s) (hn : a ≠ b) (h₀ : ∀ c ∈ s, c ≠ a ∧ c ≠ b → f c = 1) : ∏ x ∈ s, f x = f a * f b := by haveI := Classical.decEq α; let s' := ({a, b} : Finset α) have hu : s' ⊆ s := by refine insert_subset_iff.mpr ?_ apply And.intro ha apply singleton_subset_iff.mpr hb have hf : ∀ c ∈ s, c ∉ s' → f c = 1 := by intro c hc hcs apply h₀ c hc apply not_or.mp intro hab apply hcs rw [mem_insert, mem_singleton] exact hab rw [← prod_subset hu hf] exact Finset.prod_pair hn #align finset.prod_eq_mul_of_mem Finset.prod_eq_mul_of_mem #align finset.sum_eq_add_of_mem Finset.sum_eq_add_of_mem @[to_additive] theorem prod_eq_mul {s : Finset α} {f : α → β} (a b : α) (hn : a ≠ b) (h₀ : ∀ c ∈ s, c ≠ a ∧ c ≠ b → f c = 1) (ha : a ∉ s → f a = 1) (hb : b ∉ s → f b = 1) : ∏ x ∈ s, f x = f a * f b := by haveI := Classical.decEq α; by_cases h₁ : a ∈ s <;> by_cases h₂ : b ∈ s · exact prod_eq_mul_of_mem a b h₁ h₂ hn h₀ · rw [hb h₂, mul_one] apply prod_eq_single_of_mem a h₁ exact fun c hc hca => h₀ c hc ⟨hca, ne_of_mem_of_not_mem hc h₂⟩ · rw [ha h₁, one_mul] apply prod_eq_single_of_mem b h₂ exact fun c hc hcb => h₀ c hc ⟨ne_of_mem_of_not_mem hc h₁, hcb⟩ · rw [ha h₁, hb h₂, mul_one] exact _root_.trans (prod_congr rfl fun c hc => h₀ c hc ⟨ne_of_mem_of_not_mem hc h₁, ne_of_mem_of_not_mem hc h₂⟩) prod_const_one #align finset.prod_eq_mul Finset.prod_eq_mul #align finset.sum_eq_add Finset.sum_eq_add -- Porting note: simpNF linter complains that LHS doesn't simplify, but it does @[to_additive (attr := simp, nolint simpNF) "A sum over `s.subtype p` equals one over `s.filter p`."] theorem prod_subtype_eq_prod_filter (f : α → β) {p : α → Prop} [DecidablePred p] : ∏ x ∈ s.subtype p, f x = ∏ x ∈ s.filter p, f x := by conv_lhs => erw [← prod_map (s.subtype p) (Function.Embedding.subtype _) f] exact prod_congr (subtype_map _) fun x _hx => rfl #align finset.prod_subtype_eq_prod_filter Finset.prod_subtype_eq_prod_filter #align finset.sum_subtype_eq_sum_filter Finset.sum_subtype_eq_sum_filter @[to_additive "If all elements of a `Finset` satisfy the predicate `p`, a sum over `s.subtype p` equals that sum over `s`."] theorem prod_subtype_of_mem (f : α → β) {p : α → Prop} [DecidablePred p] (h : ∀ x ∈ s, p x) : ∏ x ∈ s.subtype p, f x = ∏ x ∈ s, f x := by rw [prod_subtype_eq_prod_filter, filter_true_of_mem] simpa using h #align finset.prod_subtype_of_mem Finset.prod_subtype_of_mem #align finset.sum_subtype_of_mem Finset.sum_subtype_of_mem @[to_additive "A sum of a function over a `Finset` in a subtype equals a sum in the main type of a function that agrees with the first function on that `Finset`."] theorem prod_subtype_map_embedding {p : α → Prop} {s : Finset { x // p x }} {f : { x // p x } → β} {g : α → β} (h : ∀ x : { x // p x }, x ∈ s → g x = f x) : (∏ x ∈ s.map (Function.Embedding.subtype _), g x) = ∏ x ∈ s, f x := by rw [Finset.prod_map] exact Finset.prod_congr rfl h #align finset.prod_subtype_map_embedding Finset.prod_subtype_map_embedding #align finset.sum_subtype_map_embedding Finset.sum_subtype_map_embedding variable (f s) @[to_additive] theorem prod_coe_sort_eq_attach (f : s → β) : ∏ i : s, f i = ∏ i ∈ s.attach, f i := rfl #align finset.prod_coe_sort_eq_attach Finset.prod_coe_sort_eq_attach #align finset.sum_coe_sort_eq_attach Finset.sum_coe_sort_eq_attach @[to_additive] theorem prod_coe_sort : ∏ i : s, f i = ∏ i ∈ s, f i := prod_attach _ _ #align finset.prod_coe_sort Finset.prod_coe_sort #align finset.sum_coe_sort Finset.sum_coe_sort @[to_additive] theorem prod_finset_coe (f : α → β) (s : Finset α) : (∏ i : (s : Set α), f i) = ∏ i ∈ s, f i := prod_coe_sort s f #align finset.prod_finset_coe Finset.prod_finset_coe #align finset.sum_finset_coe Finset.sum_finset_coe variable {f s} @[to_additive] theorem prod_subtype {p : α → Prop} {F : Fintype (Subtype p)} (s : Finset α) (h : ∀ x, x ∈ s ↔ p x) (f : α → β) : ∏ a ∈ s, f a = ∏ a : Subtype p, f a := by have : (· ∈ s) = p := Set.ext h subst p rw [← prod_coe_sort] congr! #align finset.prod_subtype Finset.prod_subtype #align finset.sum_subtype Finset.sum_subtype @[to_additive] lemma prod_preimage' (f : ι → κ) [DecidablePred (· ∈ Set.range f)] (s : Finset κ) (hf) (g : κ → β) : ∏ x ∈ s.preimage f hf, g (f x) = ∏ x ∈ s.filter (· ∈ Set.range f), g x := by classical calc ∏ x ∈ preimage s f hf, g (f x) = ∏ x ∈ image f (preimage s f hf), g x := Eq.symm <\| prod_image <\| by simpa only [mem_preimage, Set.InjOn] using hf _ = ∏ x ∈ s.filter fun x => x ∈ Set.range f, g x := by rw [image_preimage] #align finset.prod_preimage' Finset.prod_preimage' #align finset.sum_preimage' Finset.sum_preimage' @[to_additive] lemma prod_preimage (f : ι → κ) (s : Finset κ) (hf) (g : κ → β) (hg : ∀ x ∈ s, x ∉ Set.range f → g x = 1) : ∏ x ∈ s.preimage f hf, g (f x) = ∏ x ∈ s, g x := by classical rw [prod_preimage', prod_filter_of_ne]; exact fun x hx ↦ Not.imp_symm (hg x hx) #align finset.prod_preimage Finset.prod_preimage #align finset.sum_preimage Finset.sum_preimage @[to_additive] lemma prod_preimage_of_bij (f : ι → κ) (s : Finset κ) (hf : Set.BijOn f (f ⁻¹' ↑s) ↑s) (g : κ → β) : ∏ x ∈ s.preimage f hf.injOn, g (f x) = ∏ x ∈ s, g x := prod_preimage _ _ hf.injOn g fun _ hs h_f ↦ (h_f <\| hf.subset_range hs).elim #align finset.prod_preimage_of_bij Finset.prod_preimage_of_bij #align finset.sum_preimage_of_bij Finset.sum_preimage_of_bij @[to_additive] theorem prod_set_coe (s : Set α) [Fintype s] : (∏ i : s, f i) = ∏ i ∈ s.toFinset, f i := (Finset.prod_subtype s.toFinset (fun _ ↦ Set.mem_toFinset) f).symm @[to_additive "The sum of a function `g` defined only on a set `s` is equal to the sum of a function `f` defined everywhere, as long as `f` and `g` agree on `s`, and `f = 0` off `s`."] theorem prod_congr_set {α : Type} [CommMonoid α] {β : Type} [Fintype β] (s : Set β) [DecidablePred (· ∈ s)] (f : β → α) (g : s → α) (w : ∀ (x : β) (h : x ∈ s), f x = g ⟨x, h⟩) (w' : ∀ x : β, x ∉ s → f x = 1) : Finset.univ.prod f = Finset.univ.prod g := by rw [← @Finset.prod_subset _ _ s.toFinset Finset.univ f _ (by simp)] · rw [Finset.prod_subtype] · apply Finset.prod_congr rfl exact fun ⟨x, h⟩ _ => w x h · simp · rintro x _ h exact w' x (by simpa using h) #align finset.prod_congr_set Finset.prod_congr_set #align finset.sum_congr_set Finset.sum_congr_set @[to_additive] theorem prod_apply_dite {s : Finset α} {p : α → Prop} {hp : DecidablePred p} [DecidablePred fun x => ¬p x] (f : ∀ x : α, p x → γ) (g : ∀ x : α, ¬p x → γ) (h : γ → β) : (∏ x ∈ s, h (if hx : p x then f x hx else g x hx)) = (∏ x ∈ (s.filter p).attach, h (f x.1 <\| by simpa using (mem_filter.mp x.2).2)) * ∏ x ∈ (s.filter fun x => ¬p x).attach, h (g x.1 <\| by simpa using (mem_filter.mp x.2).2) := calc (∏ x ∈ s, h (if hx : p x then f x hx else g x hx)) = (∏ x ∈ s.filter p, h (if hx : p x then f x hx else g x hx)) * ∏ x ∈ s.filter (¬p ·), h (if hx : p x then f x hx else g x hx) := (prod_filter_mul_prod_filter_not s p _).symm _ = (∏ x ∈ (s.filter p).attach, h (if hx : p x.1 then f x.1 hx else g x.1 hx)) * ∏ x ∈ (s.filter (¬p ·)).attach, h (if hx : p x.1 then f x.1 hx else g x.1 hx) := congr_arg₂ _ (prod_attach _ _).symm (prod_attach _ _).symm _ = (∏ x ∈ (s.filter p).attach, h (f x.1 <\| by simpa using (mem_filter.mp x.2).2)) * ∏ x ∈ (s.filter (¬p ·)).attach, h (g x.1 <\| by simpa using (mem_filter.mp x.2).2) := congr_arg₂ _ (prod_congr rfl fun x _hx ↦ congr_arg h (dif_pos <\| by simpa using (mem_filter.mp x.2).2)) (prod_congr rfl fun x _hx => congr_arg h (dif_neg <\| by simpa using (mem_filter.mp x.2).2)) #align finset.prod_apply_dite Finset.prod_apply_dite #align finset.sum_apply_dite Finset.sum_apply_dite @[to_additive] theorem prod_apply_ite {s : Finset α} {p : α → Prop} {_hp : DecidablePred p} (f g : α → γ) (h : γ → β) : (∏ x ∈ s, h (if p x then f x else g x)) = (∏ x ∈ s.filter p, h (f x)) * ∏ x ∈ s.filter fun x => ¬p x, h (g x) := (prod_apply_dite _ _ _).trans <\| congr_arg₂ _ (prod_attach _ (h ∘ f)) (prod_attach _ (h ∘ g)) #align finset.prod_apply_ite Finset.prod_apply_ite #align finset.sum_apply_ite Finset.sum_apply_ite @[to_additive] theorem prod_dite {s : Finset α} {p : α → Prop} {hp : DecidablePred p} (f : ∀ x : α, p x → β) (g : ∀ x : α, ¬p x → β) : ∏ x ∈ s, (if hx : p x then f x hx else g x hx) = (∏ x ∈ (s.filter p).attach, f x.1 (by simpa using (mem_filter.mp x.2).2)) * ∏ x ∈ (s.filter fun x => ¬p x).attach, g x.1 (by simpa using (mem_filter.mp x.2).2) := by simp [prod_apply_dite _ _ fun x => x] #align finset.prod_dite Finset.prod_dite #align finset.sum_dite Finset.sum_dite @[to_additive] theorem prod_ite {s : Finset α} {p : α → Prop} {hp : DecidablePred p} (f g : α → β) : ∏ x ∈ s, (if p x then f x else g x) = (∏ x ∈ s.filter p, f x) * ∏ x ∈ s.filter fun x => ¬p x, g x := by simp [prod_apply_ite _ _ fun x => x] #align finset.prod_ite Finset.prod_ite #align finset.sum_ite Finset.sum_ite @[to_additive]	Mathlib/Algebra/BigOperators/Group/Finset.lean	1,222	1,226	theorem prod_ite_of_false {p : α → Prop} {hp : DecidablePred p} (f g : α → β) (h : ∀ x ∈ s, ¬p x) : ∏ x ∈ s, (if p x then f x else g x) = ∏ x ∈ s, g x := by	rw [prod_ite, filter_false_of_mem, filter_true_of_mem] · simp only [prod_empty, one_mul] all_goals intros; apply h; assumption
import Mathlib.Algebra.BigOperators.Intervals import Mathlib.Algebra.BigOperators.Ring.List import Mathlib.Data.Int.ModEq import Mathlib.Data.Nat.Bits import Mathlib.Data.Nat.Log import Mathlib.Data.List.Indexes import Mathlib.Data.List.Palindrome import Mathlib.Tactic.IntervalCases import Mathlib.Tactic.Linarith import Mathlib.Tactic.Ring #align_import data.nat.digits from "leanprover-community/mathlib"@"369525b73f229ccd76a6ec0e0e0bf2be57599768" namespace Nat variable {n : ℕ} def digitsAux0 : ℕ → List ℕ \| 0 => [] \| n + 1 => [n + 1] #align nat.digits_aux_0 Nat.digitsAux0 def digitsAux1 (n : ℕ) : List ℕ := List.replicate n 1 #align nat.digits_aux_1 Nat.digitsAux1 def digitsAux (b : ℕ) (h : 2 ≤ b) : ℕ → List ℕ \| 0 => [] \| n + 1 => ((n + 1) % b) :: digitsAux b h ((n + 1) / b) decreasing_by exact Nat.div_lt_self (Nat.succ_pos _) h #align nat.digits_aux Nat.digitsAux @[simp] theorem digitsAux_zero (b : ℕ) (h : 2 ≤ b) : digitsAux b h 0 = [] := by rw [digitsAux] #align nat.digits_aux_zero Nat.digitsAux_zero theorem digitsAux_def (b : ℕ) (h : 2 ≤ b) (n : ℕ) (w : 0 < n) : digitsAux b h n = (n % b) :: digitsAux b h (n / b) := by cases n · cases w · rw [digitsAux] #align nat.digits_aux_def Nat.digitsAux_def def digits : ℕ → ℕ → List ℕ \| 0 => digitsAux0 \| 1 => digitsAux1 \| b + 2 => digitsAux (b + 2) (by norm_num) #align nat.digits Nat.digits @[simp] theorem digits_zero (b : ℕ) : digits b 0 = [] := by rcases b with (_ \| ⟨_ \| ⟨_⟩⟩) <;> simp [digits, digitsAux0, digitsAux1] #align nat.digits_zero Nat.digits_zero -- @[simp] -- Porting note (#10618): simp can prove this theorem digits_zero_zero : digits 0 0 = [] := rfl #align nat.digits_zero_zero Nat.digits_zero_zero @[simp] theorem digits_zero_succ (n : ℕ) : digits 0 n.succ = [n + 1] := rfl #align nat.digits_zero_succ Nat.digits_zero_succ theorem digits_zero_succ' : ∀ {n : ℕ}, n ≠ 0 → digits 0 n = [n] \| 0, h => (h rfl).elim \| _ + 1, _ => rfl #align nat.digits_zero_succ' Nat.digits_zero_succ' @[simp] theorem digits_one (n : ℕ) : digits 1 n = List.replicate n 1 := rfl #align nat.digits_one Nat.digits_one -- @[simp] -- Porting note (#10685): dsimp can prove this theorem digits_one_succ (n : ℕ) : digits 1 (n + 1) = 1 :: digits 1 n := rfl #align nat.digits_one_succ Nat.digits_one_succ theorem digits_add_two_add_one (b n : ℕ) : digits (b + 2) (n + 1) = ((n + 1) % (b + 2)) :: digits (b + 2) ((n + 1) / (b + 2)) := by simp [digits, digitsAux_def] #align nat.digits_add_two_add_one Nat.digits_add_two_add_one @[simp] lemma digits_of_two_le_of_pos {b : ℕ} (hb : 2 ≤ b) (hn : 0 < n) : Nat.digits b n = n % b :: Nat.digits b (n / b) := by rw [Nat.eq_add_of_sub_eq hb rfl, Nat.eq_add_of_sub_eq hn rfl, Nat.digits_add_two_add_one] theorem digits_def' : ∀ {b : ℕ} (_ : 1 < b) {n : ℕ} (_ : 0 < n), digits b n = (n % b) :: digits b (n / b) \| 0, h => absurd h (by decide) \| 1, h => absurd h (by decide) \| b + 2, _ => digitsAux_def _ (by simp) _ #align nat.digits_def' Nat.digits_def' @[simp] theorem digits_of_lt (b x : ℕ) (hx : x ≠ 0) (hxb : x < b) : digits b x = [x] := by rcases exists_eq_succ_of_ne_zero hx with ⟨x, rfl⟩ rcases Nat.exists_eq_add_of_le' ((Nat.le_add_left 1 x).trans_lt hxb) with ⟨b, rfl⟩ rw [digits_add_two_add_one, div_eq_of_lt hxb, digits_zero, mod_eq_of_lt hxb] #align nat.digits_of_lt Nat.digits_of_lt theorem digits_add (b : ℕ) (h : 1 < b) (x y : ℕ) (hxb : x < b) (hxy : x ≠ 0 ∨ y ≠ 0) : digits b (x + b * y) = x :: digits b y := by rcases Nat.exists_eq_add_of_le' h with ⟨b, rfl : _ = _ + 2⟩ cases y · simp [hxb, hxy.resolve_right (absurd rfl)] dsimp [digits] rw [digitsAux_def] · congr · simp [Nat.add_mod, mod_eq_of_lt hxb] · simp [add_mul_div_left, div_eq_of_lt hxb] · apply Nat.succ_pos #align nat.digits_add Nat.digits_add -- If we had a function converting a list into a polynomial, -- and appropriate lemmas about that function, -- we could rewrite this in terms of that. def ofDigits {α : Type} [Semiring α] (b : α) : List ℕ → α \| [] => 0 \| h :: t => h + b ofDigits b t #align nat.of_digits Nat.ofDigits theorem ofDigits_eq_foldr {α : Type} [Semiring α] (b : α) (L : List ℕ) : ofDigits b L = List.foldr (fun x y => ↑x + b y) 0 L := by induction' L with d L ih · rfl · dsimp [ofDigits] rw [ih] #align nat.of_digits_eq_foldr Nat.ofDigits_eq_foldr theorem ofDigits_eq_sum_map_with_index_aux (b : ℕ) (l : List ℕ) : ((List.range l.length).zipWith ((fun i a : ℕ => a * b ^ (i + 1))) l).sum = b * ((List.range l.length).zipWith (fun i a => a * b ^ i) l).sum := by suffices (List.range l.length).zipWith (fun i a : ℕ => a * b ^ (i + 1)) l = (List.range l.length).zipWith (fun i a => b * (a * b ^ i)) l by simp [this] congr; ext; simp [pow_succ]; ring #align nat.of_digits_eq_sum_map_with_index_aux Nat.ofDigits_eq_sum_map_with_index_aux theorem ofDigits_eq_sum_mapIdx (b : ℕ) (L : List ℕ) : ofDigits b L = (L.mapIdx fun i a => a * b ^ i).sum := by rw [List.mapIdx_eq_enum_map, List.enum_eq_zip_range, List.map_uncurry_zip_eq_zipWith, ofDigits_eq_foldr] induction' L with hd tl hl · simp · simpa [List.range_succ_eq_map, List.zipWith_map_left, ofDigits_eq_sum_map_with_index_aux] using Or.inl hl #align nat.of_digits_eq_sum_map_with_index Nat.ofDigits_eq_sum_mapIdx @[simp] theorem ofDigits_nil {b : ℕ} : ofDigits b [] = 0 := rfl @[simp] theorem ofDigits_singleton {b n : ℕ} : ofDigits b [n] = n := by simp [ofDigits] #align nat.of_digits_singleton Nat.ofDigits_singleton @[simp] theorem ofDigits_one_cons {α : Type} [Semiring α] (h : ℕ) (L : List ℕ) : ofDigits (1 : α) (h :: L) = h + ofDigits 1 L := by simp [ofDigits] #align nat.of_digits_one_cons Nat.ofDigits_one_cons theorem ofDigits_cons {b hd} {tl : List ℕ} : ofDigits b (hd :: tl) = hd + b ofDigits b tl := rfl theorem ofDigits_append {b : ℕ} {l1 l2 : List ℕ} : ofDigits b (l1 ++ l2) = ofDigits b l1 + b ^ l1.length * ofDigits b l2 := by induction' l1 with hd tl IH · simp [ofDigits] · rw [ofDigits, List.cons_append, ofDigits, IH, List.length_cons, pow_succ'] ring #align nat.of_digits_append Nat.ofDigits_append @[norm_cast] theorem coe_ofDigits (α : Type) [Semiring α] (b : ℕ) (L : List ℕ) : ((ofDigits b L : ℕ) : α) = ofDigits (b : α) L := by induction' L with d L ih · simp [ofDigits] · dsimp [ofDigits]; push_cast; rw [ih] #align nat.coe_of_digits Nat.coe_ofDigits @[norm_cast] theorem coe_int_ofDigits (b : ℕ) (L : List ℕ) : ((ofDigits b L : ℕ) : ℤ) = ofDigits (b : ℤ) L := by induction' L with d L _ · rfl · dsimp [ofDigits]; push_cast; simp only #align nat.coe_int_of_digits Nat.coe_int_ofDigits theorem digits_zero_of_eq_zero {b : ℕ} (h : b ≠ 0) : ∀ {L : List ℕ} (_ : ofDigits b L = 0), ∀ l ∈ L, l = 0 \| _ :: _, h0, _, List.Mem.head .. => Nat.eq_zero_of_add_eq_zero_right h0 \| _ :: _, h0, _, List.Mem.tail _ hL => digits_zero_of_eq_zero h (mul_right_injective₀ h (Nat.eq_zero_of_add_eq_zero_left h0)) _ hL #align nat.digits_zero_of_eq_zero Nat.digits_zero_of_eq_zero theorem digits_ofDigits (b : ℕ) (h : 1 < b) (L : List ℕ) (w₁ : ∀ l ∈ L, l < b) (w₂ : ∀ h : L ≠ [], L.getLast h ≠ 0) : digits b (ofDigits b L) = L := by induction' L with d L ih · dsimp [ofDigits] simp · dsimp [ofDigits] replace w₂ := w₂ (by simp) rw [digits_add b h] · rw [ih] · intro l m apply w₁ exact List.mem_cons_of_mem _ m · intro h rw [List.getLast_cons h] at w₂ convert w₂ · exact w₁ d (List.mem_cons_self _ _) · by_cases h' : L = [] · rcases h' with rfl left simpa using w₂ · right contrapose! w₂ refine digits_zero_of_eq_zero h.ne_bot w₂ _ ?_ rw [List.getLast_cons h'] exact List.getLast_mem h' #align nat.digits_of_digits Nat.digits_ofDigits theorem ofDigits_digits (b n : ℕ) : ofDigits b (digits b n) = n := by cases' b with b · cases' n with n · rfl · change ofDigits 0 [n + 1] = n + 1 dsimp [ofDigits] · cases' b with b · induction' n with n ih · rfl · rw [Nat.zero_add] at ih ⊢ simp only [ih, add_comm 1, ofDigits_one_cons, Nat.cast_id, digits_one_succ] · apply Nat.strongInductionOn n _ clear n intro n h cases n · rw [digits_zero] rfl · simp only [Nat.succ_eq_add_one, digits_add_two_add_one] dsimp [ofDigits] rw [h _ (Nat.div_lt_self' _ b)] rw [Nat.mod_add_div] #align nat.of_digits_digits Nat.ofDigits_digits theorem ofDigits_one (L : List ℕ) : ofDigits 1 L = L.sum := by induction' L with _ _ ih · rfl · simp [ofDigits, List.sum_cons, ih] #align nat.of_digits_one Nat.ofDigits_one theorem digits_eq_nil_iff_eq_zero {b n : ℕ} : digits b n = [] ↔ n = 0 := by constructor · intro h have : ofDigits b (digits b n) = ofDigits b [] := by rw [h] convert this rw [ofDigits_digits] · rintro rfl simp #align nat.digits_eq_nil_iff_eq_zero Nat.digits_eq_nil_iff_eq_zero theorem digits_ne_nil_iff_ne_zero {b n : ℕ} : digits b n ≠ [] ↔ n ≠ 0 := not_congr digits_eq_nil_iff_eq_zero #align nat.digits_ne_nil_iff_ne_zero Nat.digits_ne_nil_iff_ne_zero theorem digits_eq_cons_digits_div {b n : ℕ} (h : 1 < b) (w : n ≠ 0) : digits b n = (n % b) :: digits b (n / b) := by rcases b with (_ \| _ \| b) · rw [digits_zero_succ' w, Nat.mod_zero, Nat.div_zero, Nat.digits_zero_zero] · norm_num at h rcases n with (_ \| n) · norm_num at w · simp only [digits_add_two_add_one, ne_eq] #align nat.digits_eq_cons_digits_div Nat.digits_eq_cons_digits_div theorem digits_getLast {b : ℕ} (m : ℕ) (h : 1 < b) (p q) : (digits b m).getLast p = (digits b (m / b)).getLast q := by by_cases hm : m = 0 · simp [hm] simp only [digits_eq_cons_digits_div h hm] rw [List.getLast_cons] #align nat.digits_last Nat.digits_getLast theorem digits.injective (b : ℕ) : Function.Injective b.digits := Function.LeftInverse.injective (ofDigits_digits b) #align nat.digits.injective Nat.digits.injective @[simp] theorem digits_inj_iff {b n m : ℕ} : b.digits n = b.digits m ↔ n = m := (digits.injective b).eq_iff #align nat.digits_inj_iff Nat.digits_inj_iff theorem digits_len (b n : ℕ) (hb : 1 < b) (hn : n ≠ 0) : (b.digits n).length = b.log n + 1 := by induction' n using Nat.strong_induction_on with n IH rw [digits_eq_cons_digits_div hb hn, List.length] by_cases h : n / b = 0 · have hb0 : b ≠ 0 := (Nat.succ_le_iff.1 hb).ne_bot simp [h, log_eq_zero_iff, ← Nat.div_eq_zero_iff hb0.bot_lt] · have : n / b < n := div_lt_self (Nat.pos_of_ne_zero hn) hb rw [IH _ this h, log_div_base, tsub_add_cancel_of_le] refine Nat.succ_le_of_lt (log_pos hb ?_) contrapose! h exact div_eq_of_lt h #align nat.digits_len Nat.digits_len theorem getLast_digit_ne_zero (b : ℕ) {m : ℕ} (hm : m ≠ 0) : (digits b m).getLast (digits_ne_nil_iff_ne_zero.mpr hm) ≠ 0 := by rcases b with (_ \| _ \| b) · cases m · cases hm rfl · simp · cases m · cases hm rfl rename ℕ => m simp only [zero_add, digits_one, List.getLast_replicate_succ m 1] exact Nat.one_ne_zero revert hm apply Nat.strongInductionOn m intro n IH hn by_cases hnb : n < b + 2 · simpa only [digits_of_lt (b + 2) n hn hnb] · rw [digits_getLast n (le_add_left 2 b)] refine IH _ (Nat.div_lt_self hn.bot_lt (one_lt_succ_succ b)) ?_ rw [← pos_iff_ne_zero] exact Nat.div_pos (le_of_not_lt hnb) (zero_lt_succ (succ b)) #align nat.last_digit_ne_zero Nat.getLast_digit_ne_zero theorem mul_ofDigits (n : ℕ) {b : ℕ} {l : List ℕ} : n ofDigits b l = ofDigits b (l.map (n * ·)) := by induction l with \| nil => rfl \| cons hd tl ih => rw [List.map_cons, ofDigits_cons, ofDigits_cons, ← ih] ring theorem ofDigits_add_ofDigits_eq_ofDigits_zipWith_of_length_eq {b : ℕ} {l1 l2 : List ℕ} (h : l1.length = l2.length) : ofDigits b l1 + ofDigits b l2 = ofDigits b (l1.zipWith (· + ·) l2) := by induction l1 generalizing l2 with \| nil => simp_all [eq_comm, List.length_eq_zero, ofDigits] \| cons hd₁ tl₁ ih₁ => induction l2 generalizing tl₁ with \| nil => simp_all \| cons hd₂ tl₂ ih₂ => simp_all only [List.length_cons, succ_eq_add_one, ofDigits_cons, add_left_inj, eq_comm, List.zipWith_cons_cons, add_eq] rw [← ih₁ h.symm, mul_add] ac_rfl theorem digits_lt_base' {b m : ℕ} : ∀ {d}, d ∈ digits (b + 2) m → d < b + 2 := by apply Nat.strongInductionOn m intro n IH d hd cases' n with n · rw [digits_zero] at hd cases hd -- base b+2 expansion of 0 has no digits rw [digits_add_two_add_one] at hd cases hd · exact n.succ.mod_lt (by simp) -- Porting note: Previous code (single line) contained linarith. -- . exact IH _ (Nat.div_lt_self (Nat.succ_pos _) (by linarith)) hd · apply IH ((n + 1) / (b + 2)) · apply Nat.div_lt_self <;> omega · assumption #align nat.digits_lt_base' Nat.digits_lt_base' theorem digits_lt_base {b m d : ℕ} (hb : 1 < b) (hd : d ∈ digits b m) : d < b := by rcases b with (_ \| _ \| b) <;> try simp_all exact digits_lt_base' hd #align nat.digits_lt_base Nat.digits_lt_base theorem ofDigits_lt_base_pow_length' {b : ℕ} {l : List ℕ} (hl : ∀ x ∈ l, x < b + 2) : ofDigits (b + 2) l < (b + 2) ^ l.length := by induction' l with hd tl IH · simp [ofDigits] · rw [ofDigits, List.length_cons, pow_succ] have : (ofDigits (b + 2) tl + 1) * (b + 2) ≤ (b + 2) ^ tl.length * (b + 2) := mul_le_mul (IH fun x hx => hl _ (List.mem_cons_of_mem _ hx)) (by rfl) (by simp only [zero_le]) (Nat.zero_le _) suffices ↑hd < b + 2 by linarith exact hl hd (List.mem_cons_self _ _) #align nat.of_digits_lt_base_pow_length' Nat.ofDigits_lt_base_pow_length' theorem ofDigits_lt_base_pow_length {b : ℕ} {l : List ℕ} (hb : 1 < b) (hl : ∀ x ∈ l, x < b) : ofDigits b l < b ^ l.length := by rcases b with (_ \| _ \| b) <;> try simp_all exact ofDigits_lt_base_pow_length' hl #align nat.of_digits_lt_base_pow_length Nat.ofDigits_lt_base_pow_length theorem lt_base_pow_length_digits' {b m : ℕ} : m < (b + 2) ^ (digits (b + 2) m).length := by convert @ofDigits_lt_base_pow_length' b (digits (b + 2) m) fun _ => digits_lt_base' rw [ofDigits_digits (b + 2) m] #align nat.lt_base_pow_length_digits' Nat.lt_base_pow_length_digits' theorem lt_base_pow_length_digits {b m : ℕ} (hb : 1 < b) : m < b ^ (digits b m).length := by rcases b with (_ \| _ \| b) <;> try simp_all exact lt_base_pow_length_digits' #align nat.lt_base_pow_length_digits Nat.lt_base_pow_length_digits theorem ofDigits_digits_append_digits {b m n : ℕ} : ofDigits b (digits b n ++ digits b m) = n + b ^ (digits b n).length * m := by rw [ofDigits_append, ofDigits_digits, ofDigits_digits] #align nat.of_digits_digits_append_digits Nat.ofDigits_digits_append_digits theorem digits_append_digits {b m n : ℕ} (hb : 0 < b) : digits b n ++ digits b m = digits b (n + b ^ (digits b n).length * m) := by rcases eq_or_lt_of_le (Nat.succ_le_of_lt hb) with (rfl \| hb) · simp [List.replicate_add] rw [← ofDigits_digits_append_digits] refine (digits_ofDigits b hb _ (fun l hl => ?_) (fun h_append => ?_)).symm · rcases (List.mem_append.mp hl) with (h \| h) <;> exact digits_lt_base hb h · by_cases h : digits b m = [] · simp only [h, List.append_nil] at h_append ⊢ exact getLast_digit_ne_zero b <\| digits_ne_nil_iff_ne_zero.mp h_append · exact (List.getLast_append' _ _ h) ▸ (getLast_digit_ne_zero _ <\| digits_ne_nil_iff_ne_zero.mp h) theorem digits_len_le_digits_len_succ (b n : ℕ) : (digits b n).length ≤ (digits b (n + 1)).length := by rcases Decidable.eq_or_ne n 0 with (rfl \| hn) · simp rcases le_or_lt b 1 with hb \| hb · interval_cases b <;> simp_arith [digits_zero_succ', hn] simpa [digits_len, hb, hn] using log_mono_right (le_succ _) #align nat.digits_len_le_digits_len_succ Nat.digits_len_le_digits_len_succ theorem le_digits_len_le (b n m : ℕ) (h : n ≤ m) : (digits b n).length ≤ (digits b m).length := monotone_nat_of_le_succ (digits_len_le_digits_len_succ b) h #align nat.le_digits_len_le Nat.le_digits_len_le @[mono] theorem ofDigits_monotone {p q : ℕ} (L : List ℕ) (h : p ≤ q) : ofDigits p L ≤ ofDigits q L := by induction' L with _ _ hi · rfl · simp only [ofDigits, cast_id, add_le_add_iff_left] exact Nat.mul_le_mul h hi theorem sum_le_ofDigits {p : ℕ} (L : List ℕ) (h : 1 ≤ p) : L.sum ≤ ofDigits p L := (ofDigits_one L).symm ▸ ofDigits_monotone L h theorem digit_sum_le (p n : ℕ) : List.sum (digits p n) ≤ n := by induction' n with n · exact digits_zero _ ▸ Nat.le_refl (List.sum []) · induction' p with p · rw [digits_zero_succ, List.sum_cons, List.sum_nil, add_zero] · nth_rw 2 [← ofDigits_digits p.succ (n + 1)] rw [← ofDigits_one <\| digits p.succ n.succ] exact ofDigits_monotone (digits p.succ n.succ) <\| Nat.succ_pos p theorem pow_length_le_mul_ofDigits {b : ℕ} {l : List ℕ} (hl : l ≠ []) (hl2 : l.getLast hl ≠ 0) : (b + 2) ^ l.length ≤ (b + 2) * ofDigits (b + 2) l := by rw [← List.dropLast_append_getLast hl] simp only [List.length_append, List.length, zero_add, List.length_dropLast, ofDigits_append, List.length_dropLast, ofDigits_singleton, add_comm (l.length - 1), pow_add, pow_one] apply Nat.mul_le_mul_left refine le_trans ?_ (Nat.le_add_left _ _) have : 0 < l.getLast hl := by rwa [pos_iff_ne_zero] convert Nat.mul_le_mul_left ((b + 2) ^ (l.length - 1)) this using 1 rw [Nat.mul_one] #align nat.pow_length_le_mul_of_digits Nat.pow_length_le_mul_ofDigits theorem base_pow_length_digits_le' (b m : ℕ) (hm : m ≠ 0) : (b + 2) ^ (digits (b + 2) m).length ≤ (b + 2) * m := by have : digits (b + 2) m ≠ [] := digits_ne_nil_iff_ne_zero.mpr hm convert @pow_length_le_mul_ofDigits b (digits (b+2) m) this (getLast_digit_ne_zero _ hm) rw [ofDigits_digits] #align nat.base_pow_length_digits_le' Nat.base_pow_length_digits_le' theorem base_pow_length_digits_le (b m : ℕ) (hb : 1 < b) : m ≠ 0 → b ^ (digits b m).length ≤ b * m := by rcases b with (_ \| _ \| b) <;> try simp_all exact base_pow_length_digits_le' b m #align nat.base_pow_length_digits_le Nat.base_pow_length_digits_le lemma ofDigits_div_eq_ofDigits_tail {p : ℕ} (hpos : 0 < p) (digits : List ℕ) (w₁ : ∀ l ∈ digits, l < p) : ofDigits p digits / p = ofDigits p digits.tail := by induction' digits with hd tl · simp [ofDigits] · refine Eq.trans (add_mul_div_left hd _ hpos) ?_ rw [Nat.div_eq_of_lt <\| w₁ _ <\| List.mem_cons_self _ _, zero_add] rfl lemma ofDigits_div_pow_eq_ofDigits_drop {p : ℕ} (i : ℕ) (hpos : 0 < p) (digits : List ℕ) (w₁ : ∀ l ∈ digits, l < p) : ofDigits p digits / p ^ i = ofDigits p (digits.drop i) := by induction' i with i hi · simp · rw [Nat.pow_succ, ← Nat.div_div_eq_div_mul, hi, ofDigits_div_eq_ofDigits_tail hpos (List.drop i digits) fun x hx ↦ w₁ x <\| List.mem_of_mem_drop hx, ← List.drop_one, List.drop_drop, add_comm] lemma self_div_pow_eq_ofDigits_drop {p : ℕ} (i n : ℕ) (h : 2 ≤ p): n / p ^ i = ofDigits p ((p.digits n).drop i) := by convert ofDigits_div_pow_eq_ofDigits_drop i (zero_lt_of_lt h) (p.digits n) (fun l hl ↦ digits_lt_base h hl) exact (ofDigits_digits p n).symm open Finset theorem sub_one_mul_sum_div_pow_eq_sub_sum_digits {p : ℕ} (L : List ℕ) {h_nonempty} (h_ne_zero : L.getLast h_nonempty ≠ 0) (h_lt : ∀ l ∈ L, l < p) : (p - 1) * ∑ i ∈ range L.length, (ofDigits p L) / p ^ i.succ = (ofDigits p L) - L.sum := by obtain h \| rfl \| h : 1 < p ∨ 1 = p ∨ p < 1 := trichotomous 1 p · induction' L with hd tl ih · simp [ofDigits] · simp only [List.length_cons, List.sum_cons, self_div_pow_eq_ofDigits_drop _ _ h, digits_ofDigits p h (hd :: tl) h_lt (fun _ => h_ne_zero)] simp only [ofDigits] rw [sum_range_succ, Nat.cast_id] simp only [List.drop, List.drop_length] obtain rfl \| h' := em <\| tl = [] · simp [ofDigits] · have w₁' := fun l hl ↦ h_lt l <\| List.mem_cons_of_mem hd hl have w₂' := fun (h : tl ≠ []) ↦ (List.getLast_cons h) ▸ h_ne_zero have ih := ih (w₂' h') w₁' simp only [self_div_pow_eq_ofDigits_drop _ _ h, digits_ofDigits p h tl w₁' w₂', ← Nat.one_add] at ih have := sum_singleton (fun x ↦ ofDigits p <\| tl.drop x) tl.length rw [← Ico_succ_singleton, List.drop_length, ofDigits] at this have h₁ : 1 ≤ tl.length := List.length_pos.mpr h' rw [← sum_range_add_sum_Ico _ <\| h₁, ← add_zero (∑ x ∈ Ico _ _, ofDigits p (tl.drop x)), ← this, sum_Ico_consecutive _ h₁ <\| (le_add_right tl.length 1), ← sum_Ico_add _ 0 tl.length 1, Ico_zero_eq_range, mul_add, mul_add, ih, range_one, sum_singleton, List.drop, ofDigits, mul_zero, add_zero, ← Nat.add_sub_assoc <\| sum_le_ofDigits _ <\| Nat.le_of_lt h] nth_rw 2 [← one_mul <\| ofDigits p tl] rw [← add_mul, one_eq_succ_zero, Nat.sub_add_cancel <\| zero_lt_of_lt h, Nat.add_sub_add_left] · simp [ofDigits_one] · simp [lt_one_iff.mp h] cases L · rfl · simp [ofDigits] theorem sub_one_mul_sum_log_div_pow_eq_sub_sum_digits {p : ℕ} (n : ℕ) : (p - 1) * ∑ i ∈ range (log p n).succ, n / p ^ i.succ = n - (p.digits n).sum := by obtain h \| rfl \| h : 1 < p ∨ 1 = p ∨ p < 1 := trichotomous 1 p · rcases eq_or_ne n 0 with rfl \| hn · simp · convert sub_one_mul_sum_div_pow_eq_sub_sum_digits (p.digits n) (getLast_digit_ne_zero p hn) <\| (fun l a ↦ digits_lt_base h a) · refine (digits_len p n h hn).symm all_goals exact (ofDigits_digits p n).symm · simp · simp [lt_one_iff.mp h] cases n all_goals simp theorem digits_two_eq_bits (n : ℕ) : digits 2 n = n.bits.map fun b => cond b 1 0 := by induction' n using Nat.binaryRecFromOne with b n h ih · simp · rfl rw [bits_append_bit _ _ fun hn => absurd hn h] cases b · rw [digits_def' one_lt_two] · simpa [Nat.bit, Nat.bit0_val n] · simpa [pos_iff_ne_zero, Nat.bit0_eq_zero] · simpa [Nat.bit, Nat.bit1_val n, add_comm, digits_add 2 one_lt_two 1 n, Nat.add_mul_div_left] #align nat.digits_two_eq_bits Nat.digits_two_eq_bits -- This is really a theorem about polynomials.	Mathlib/Data/Nat/Digits.lean	639	645	theorem dvd_ofDigits_sub_ofDigits {α : Type*} [CommRing α] {a b k : α} (h : k ∣ a - b) (L : List ℕ) : k ∣ ofDigits a L - ofDigits b L := by	induction' L with d L ih · change k ∣ 0 - 0 simp · simp only [ofDigits, add_sub_add_left_eq_sub] exact dvd_mul_sub_mul h ih
import Mathlib.Data.Finset.Basic import Mathlib.ModelTheory.Syntax import Mathlib.Data.List.ProdSigma #align_import model_theory.semantics from "leanprover-community/mathlib"@"d565b3df44619c1498326936be16f1a935df0728" universe u v w u' v' namespace FirstOrder namespace Language variable {L : Language.{u, v}} {L' : Language} variable {M : Type w} {N P : Type} [L.Structure M] [L.Structure N] [L.Structure P] variable {α : Type u'} {β : Type v'} {γ : Type} open FirstOrder Cardinal open Structure Cardinal Fin @[simp] theorem Hom.realize_term (g : M →[L] N) {t : L.Term α} {v : α → M} : t.realize (g ∘ v) = g (t.realize v) := by induction t · rfl · rw [Term.realize, Term.realize, g.map_fun] refine congr rfl ?_ ext x simp [*] #align first_order.language.hom.realize_term FirstOrder.Language.Hom.realize_term @[simp] theorem Embedding.realize_term {v : α → M} (t : L.Term α) (g : M ↪[L] N) : t.realize (g ∘ v) = g (t.realize v) := g.toHom.realize_term #align first_order.language.embedding.realize_term FirstOrder.Language.Embedding.realize_term @[simp] theorem Equiv.realize_term {v : α → M} (t : L.Term α) (g : M ≃[L] N) : t.realize (g ∘ v) = g (t.realize v) := g.toHom.realize_term #align first_order.language.equiv.realize_term FirstOrder.Language.Equiv.realize_term variable {n : ℕ} -- Porting note: no `protected` attribute in Lean4 -- attribute [protected] bounded_formula.falsum bounded_formula.equal bounded_formula.rel -- attribute [protected] bounded_formula.imp bounded_formula.all @[simp] theorem LHom.realize_onSentence [L'.Structure M] (φ : L →ᴸ L') [φ.IsExpansionOn M] (ψ : L.Sentence) : M ⊨ φ.onSentence ψ ↔ M ⊨ ψ := φ.realize_onFormula ψ set_option linter.uppercaseLean3 false in #align first_order.language.Lhom.realize_on_sentence FirstOrder.Language.LHom.realize_onSentence variable (L) def completeTheory : L.Theory := { φ \| M ⊨ φ } #align first_order.language.complete_theory FirstOrder.Language.completeTheory variable (N) def ElementarilyEquivalent : Prop := L.completeTheory M = L.completeTheory N #align first_order.language.elementarily_equivalent FirstOrder.Language.ElementarilyEquivalent @[inherit_doc FirstOrder.Language.ElementarilyEquivalent] scoped[FirstOrder] notation:25 A " ≅[" L "] " B:50 => FirstOrder.Language.ElementarilyEquivalent L A B variable {L} {M} {N} @[simp] theorem mem_completeTheory {φ : Sentence L} : φ ∈ L.completeTheory M ↔ M ⊨ φ := Iff.rfl #align first_order.language.mem_complete_theory FirstOrder.Language.mem_completeTheory theorem elementarilyEquivalent_iff : M ≅[L] N ↔ ∀ φ : L.Sentence, M ⊨ φ ↔ N ⊨ φ := by simp only [ElementarilyEquivalent, Set.ext_iff, completeTheory, Set.mem_setOf_eq] #align first_order.language.elementarily_equivalent_iff FirstOrder.Language.elementarilyEquivalent_iff variable (M) class Theory.Model (T : L.Theory) : Prop where realize_of_mem : ∀ φ ∈ T, M ⊨ φ set_option linter.uppercaseLean3 false in #align first_order.language.Theory.model FirstOrder.Language.Theory.Model -- input using \\|= or \vDash, but not using \models @[inherit_doc Theory.Model] infixl:51 " ⊨ " => Theory.Model variable {M} (T : L.Theory) @[simp default-10] theorem Theory.model_iff : M ⊨ T ↔ ∀ φ ∈ T, M ⊨ φ := ⟨fun h => h.realize_of_mem, fun h => ⟨h⟩⟩ set_option linter.uppercaseLean3 false in #align first_order.language.Theory.model_iff FirstOrder.Language.Theory.model_iff theorem Theory.realize_sentence_of_mem [M ⊨ T] {φ : L.Sentence} (h : φ ∈ T) : M ⊨ φ := Theory.Model.realize_of_mem φ h set_option linter.uppercaseLean3 false in #align first_order.language.Theory.realize_sentence_of_mem FirstOrder.Language.Theory.realize_sentence_of_mem @[simp] theorem LHom.onTheory_model [L'.Structure M] (φ : L →ᴸ L') [φ.IsExpansionOn M] (T : L.Theory) : M ⊨ φ.onTheory T ↔ M ⊨ T := by simp [Theory.model_iff, LHom.onTheory] set_option linter.uppercaseLean3 false in #align first_order.language.Lhom.on_Theory_model FirstOrder.Language.LHom.onTheory_model variable {T} instance model_empty : M ⊨ (∅ : L.Theory) := ⟨fun φ hφ => (Set.not_mem_empty φ hφ).elim⟩ #align first_order.language.model_empty FirstOrder.Language.model_empty section Cardinality variable (L) @[simp] theorem Sentence.realize_cardGe (n) : M ⊨ Sentence.cardGe L n ↔ ↑n ≤ #M := by rw [← lift_mk_fin, ← lift_le.{0}, lift_lift, lift_mk_le, Sentence.cardGe, Sentence.Realize, BoundedFormula.realize_exs] simp_rw [BoundedFormula.realize_foldr_inf] simp only [Function.comp_apply, List.mem_map, Prod.exists, Ne, List.mem_product, List.mem_finRange, forall_exists_index, and_imp, List.mem_filter, true_and_iff] refine ⟨?_, fun xs => ⟨xs.some, ?_⟩⟩ · rintro ⟨xs, h⟩ refine ⟨⟨xs, fun i j ij => ?_⟩⟩ contrapose! ij have hij := h _ i j (by simpa using ij) rfl simp only [BoundedFormula.realize_not, Term.realize, BoundedFormula.realize_bdEqual, Sum.elim_inr] at hij exact hij · rintro _ i j ij rfl simpa using ij #align first_order.language.sentence.realize_card_ge FirstOrder.Language.Sentence.realize_cardGe @[simp]	Mathlib/ModelTheory/Semantics.lean	1,119	1,120	theorem model_infiniteTheory_iff : M ⊨ L.infiniteTheory ↔ Infinite M := by	simp [infiniteTheory, infinite_iff, aleph0_le]
import Mathlib.Analysis.Convex.Basic import Mathlib.Topology.Algebra.Group.Basic import Mathlib.Topology.Order.Basic #align_import analysis.convex.strict from "leanprover-community/mathlib"@"84dc0bd6619acaea625086d6f53cb35cdd554219" open Set open Convex Pointwise variable {𝕜 𝕝 E F β : Type*} open Function Set open Convex section OrderedSemiring variable [OrderedSemiring 𝕜] [TopologicalSpace E] [TopologicalSpace F] section AddCommMonoid variable [AddCommMonoid E] [AddCommMonoid F] section Module variable [Module 𝕜 E] [Module 𝕜 F] {s : Set E} protected theorem StrictConvex.convex (hs : StrictConvex 𝕜 s) : Convex 𝕜 s := convex_iff_pairwise_pos.2 fun _ hx _ hy hxy _ _ ha hb hab => interior_subset <\| hs hx hy hxy ha hb hab #align strict_convex.convex StrictConvex.convex protected theorem Convex.strictConvex_of_isOpen (h : IsOpen s) (hs : Convex 𝕜 s) : StrictConvex 𝕜 s := fun _ hx _ hy _ _ _ ha hb hab => h.interior_eq.symm ▸ hs hx hy ha.le hb.le hab #align convex.strict_convex_of_open Convex.strictConvex_of_isOpen theorem IsOpen.strictConvex_iff (h : IsOpen s) : StrictConvex 𝕜 s ↔ Convex 𝕜 s := ⟨StrictConvex.convex, Convex.strictConvex_of_isOpen h⟩ #align is_open.strict_convex_iff IsOpen.strictConvex_iff theorem strictConvex_singleton (c : E) : StrictConvex 𝕜 ({c} : Set E) := pairwise_singleton _ _ #align strict_convex_singleton strictConvex_singleton theorem Set.Subsingleton.strictConvex (hs : s.Subsingleton) : StrictConvex 𝕜 s := hs.pairwise _ #align set.subsingleton.strict_convex Set.Subsingleton.strictConvex theorem StrictConvex.linear_image [Semiring 𝕝] [Module 𝕝 E] [Module 𝕝 F] [LinearMap.CompatibleSMul E F 𝕜 𝕝] (hs : StrictConvex 𝕜 s) (f : E →ₗ[𝕝] F) (hf : IsOpenMap f) : StrictConvex 𝕜 (f '' s) := by rintro _ ⟨x, hx, rfl⟩ _ ⟨y, hy, rfl⟩ hxy a b ha hb hab refine hf.image_interior_subset _ ⟨a • x + b • y, hs hx hy (ne_of_apply_ne _ hxy) ha hb hab, ?_⟩ rw [map_add, f.map_smul_of_tower a, f.map_smul_of_tower b] #align strict_convex.linear_image StrictConvex.linear_image theorem StrictConvex.is_linear_image (hs : StrictConvex 𝕜 s) {f : E → F} (h : IsLinearMap 𝕜 f) (hf : IsOpenMap f) : StrictConvex 𝕜 (f '' s) := hs.linear_image (h.mk' f) hf #align strict_convex.is_linear_image StrictConvex.is_linear_image theorem StrictConvex.linear_preimage {s : Set F} (hs : StrictConvex 𝕜 s) (f : E →ₗ[𝕜] F) (hf : Continuous f) (hfinj : Injective f) : StrictConvex 𝕜 (s.preimage f) := by intro x hx y hy hxy a b ha hb hab refine preimage_interior_subset_interior_preimage hf ?_ rw [mem_preimage, f.map_add, f.map_smul, f.map_smul] exact hs hx hy (hfinj.ne hxy) ha hb hab #align strict_convex.linear_preimage StrictConvex.linear_preimage theorem StrictConvex.is_linear_preimage {s : Set F} (hs : StrictConvex 𝕜 s) {f : E → F} (h : IsLinearMap 𝕜 f) (hf : Continuous f) (hfinj : Injective f) : StrictConvex 𝕜 (s.preimage f) := hs.linear_preimage (h.mk' f) hf hfinj #align strict_convex.is_linear_preimage StrictConvex.is_linear_preimage section AddCommGroup variable [AddCommGroup E] [AddCommGroup F] [Module 𝕜 E] [Module 𝕜 F] section continuous_add variable [ContinuousAdd E] {s t : Set E}	Mathlib/Analysis/Convex/Strict.lean	246	258	theorem StrictConvex.add (hs : StrictConvex 𝕜 s) (ht : StrictConvex 𝕜 t) : StrictConvex 𝕜 (s + t) := by	rintro _ ⟨v, hv, w, hw, rfl⟩ _ ⟨x, hx, y, hy, rfl⟩ h a b ha hb hab rw [smul_add, smul_add, add_add_add_comm] obtain rfl \| hvx := eq_or_ne v x · refine interior_mono (add_subset_add (singleton_subset_iff.2 hv) Subset.rfl) ?_ rw [Convex.combo_self hab, singleton_add] exact (isOpenMap_add_left _).image_interior_subset _ (mem_image_of_mem _ <\| ht hw hy (ne_of_apply_ne _ h) ha hb hab) exact subset_interior_add_left (add_mem_add (hs hv hx hvx ha hb hab) <\| ht.convex hw hy ha.le hb.le hab)
import Mathlib.Analysis.Asymptotics.AsymptoticEquivalent import Mathlib.Analysis.Normed.Group.Lemmas import Mathlib.Analysis.NormedSpace.AddTorsor import Mathlib.Analysis.NormedSpace.AffineIsometry import Mathlib.Analysis.NormedSpace.OperatorNorm.NormedSpace import Mathlib.Analysis.NormedSpace.RieszLemma import Mathlib.Analysis.NormedSpace.Pointwise import Mathlib.Topology.Algebra.Module.FiniteDimension import Mathlib.Topology.Algebra.InfiniteSum.Module import Mathlib.Topology.Instances.Matrix #align_import analysis.normed_space.finite_dimension from "leanprover-community/mathlib"@"9425b6f8220e53b059f5a4904786c3c4b50fc057" universe u v w x noncomputable section open Set FiniteDimensional TopologicalSpace Filter Asymptotics Classical Topology NNReal Metric section CompleteField variable {𝕜 : Type u} [NontriviallyNormedField 𝕜] {E : Type v} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {F : Type w} [NormedAddCommGroup F] [NormedSpace 𝕜 F] {F' : Type x} [AddCommGroup F'] [Module 𝕜 F'] [TopologicalSpace F'] [TopologicalAddGroup F'] [ContinuousSMul 𝕜 F'] [CompleteSpace 𝕜] theorem ContinuousLinearMap.continuous_det : Continuous fun f : E →L[𝕜] E => f.det := by change Continuous fun f : E →L[𝕜] E => LinearMap.det (f : E →ₗ[𝕜] E) -- Porting note: this could be easier with `det_cases` by_cases h : ∃ s : Finset E, Nonempty (Basis (↥s) 𝕜 E) · rcases h with ⟨s, ⟨b⟩⟩ haveI : FiniteDimensional 𝕜 E := FiniteDimensional.of_fintype_basis b simp_rw [LinearMap.det_eq_det_toMatrix_of_finset b] refine Continuous.matrix_det ?_ exact ((LinearMap.toMatrix b b).toLinearMap.comp (ContinuousLinearMap.coeLM 𝕜)).continuous_of_finiteDimensional · -- Porting note: was `unfold LinearMap.det` rw [LinearMap.det_def] simpa only [h, MonoidHom.one_apply, dif_neg, not_false_iff] using continuous_const #align continuous_linear_map.continuous_det ContinuousLinearMap.continuous_det irreducible_def lipschitzExtensionConstant (E' : Type) [NormedAddCommGroup E'] [NormedSpace ℝ E'] [FiniteDimensional ℝ E'] : ℝ≥0 := let A := (Basis.ofVectorSpace ℝ E').equivFun.toContinuousLinearEquiv max (‖A.symm.toContinuousLinearMap‖₊ ‖A.toContinuousLinearMap‖₊) 1 #align lipschitz_extension_constant lipschitzExtensionConstant theorem lipschitzExtensionConstant_pos (E' : Type) [NormedAddCommGroup E'] [NormedSpace ℝ E'] [FiniteDimensional ℝ E'] : 0 < lipschitzExtensionConstant E' := by rw [lipschitzExtensionConstant] exact zero_lt_one.trans_le (le_max_right _ _) #align lipschitz_extension_constant_pos lipschitzExtensionConstant_pos theorem LipschitzOnWith.extend_finite_dimension {α : Type} [PseudoMetricSpace α] {E' : Type} [NormedAddCommGroup E'] [NormedSpace ℝ E'] [FiniteDimensional ℝ E'] {s : Set α} {f : α → E'} {K : ℝ≥0} (hf : LipschitzOnWith K f s) : ∃ g : α → E', LipschitzWith (lipschitzExtensionConstant E' K) g ∧ EqOn f g s := by let ι : Type _ := Basis.ofVectorSpaceIndex ℝ E' let A := (Basis.ofVectorSpace ℝ E').equivFun.toContinuousLinearEquiv have LA : LipschitzWith ‖A.toContinuousLinearMap‖₊ A := by apply A.lipschitz have L : LipschitzOnWith (‖A.toContinuousLinearMap‖₊ * K) (A ∘ f) s := LA.comp_lipschitzOnWith hf obtain ⟨g, hg, gs⟩ : ∃ g : α → ι → ℝ, LipschitzWith (‖A.toContinuousLinearMap‖₊ * K) g ∧ EqOn (A ∘ f) g s := L.extend_pi refine ⟨A.symm ∘ g, ?_, ?_⟩ · have LAsymm : LipschitzWith ‖A.symm.toContinuousLinearMap‖₊ A.symm := by apply A.symm.lipschitz apply (LAsymm.comp hg).weaken rw [lipschitzExtensionConstant, ← mul_assoc] exact mul_le_mul' (le_max_left _ _) le_rfl · intro x hx have : A (f x) = g x := gs hx simp only [(· ∘ ·), ← this, A.symm_apply_apply] #align lipschitz_on_with.extend_finite_dimension LipschitzOnWith.extend_finite_dimension theorem LinearMap.exists_antilipschitzWith [FiniteDimensional 𝕜 E] (f : E →ₗ[𝕜] F) (hf : LinearMap.ker f = ⊥) : ∃ K > 0, AntilipschitzWith K f := by cases subsingleton_or_nontrivial E · exact ⟨1, zero_lt_one, AntilipschitzWith.of_subsingleton⟩ · rw [LinearMap.ker_eq_bot] at hf let e : E ≃L[𝕜] LinearMap.range f := (LinearEquiv.ofInjective f hf).toContinuousLinearEquiv exact ⟨_, e.nnnorm_symm_pos, e.antilipschitz⟩ #align linear_map.exists_antilipschitz_with LinearMap.exists_antilipschitzWith open Function in theorem LinearMap.injective_iff_antilipschitz [FiniteDimensional 𝕜 E] (f : E →ₗ[𝕜] F) : Injective f ↔ ∃ K > 0, AntilipschitzWith K f := by constructor · rw [← LinearMap.ker_eq_bot] exact f.exists_antilipschitzWith · rintro ⟨K, -, H⟩ exact H.injective open Function in theorem ContinuousLinearMap.isOpen_injective [FiniteDimensional 𝕜 E] : IsOpen { L : E →L[𝕜] F \| Injective L } := by rw [isOpen_iff_eventually] rintro φ₀ hφ₀ rcases φ₀.injective_iff_antilipschitz.mp hφ₀ with ⟨K, K_pos, H⟩ have : ∀ᶠ φ in 𝓝 φ₀, ‖φ - φ₀‖₊ < K⁻¹ := eventually_nnnorm_sub_lt _ <\| inv_pos_of_pos K_pos filter_upwards [this] with φ hφ apply φ.injective_iff_antilipschitz.mpr exact ⟨(K⁻¹ - ‖φ - φ₀‖₊)⁻¹, inv_pos_of_pos (tsub_pos_of_lt hφ), H.add_sub_lipschitzWith (φ - φ₀).lipschitz hφ⟩ protected theorem LinearIndependent.eventually {ι} [Finite ι] {f : ι → E} (hf : LinearIndependent 𝕜 f) : ∀ᶠ g in 𝓝 f, LinearIndependent 𝕜 g := by cases nonempty_fintype ι simp only [Fintype.linearIndependent_iff'] at hf ⊢ rcases LinearMap.exists_antilipschitzWith _ hf with ⟨K, K0, hK⟩ have : Tendsto (fun g : ι → E => ∑ i, ‖g i - f i‖) (𝓝 f) (𝓝 <\| ∑ i, ‖f i - f i‖) := tendsto_finset_sum _ fun i _ => Tendsto.norm <\| ((continuous_apply i).tendsto _).sub tendsto_const_nhds simp only [sub_self, norm_zero, Finset.sum_const_zero] at this refine (this.eventually (gt_mem_nhds <\| inv_pos.2 K0)).mono fun g hg => ?_ replace hg : ∑ i, ‖g i - f i‖₊ < K⁻¹ := by rw [← NNReal.coe_lt_coe] push_cast exact hg rw [LinearMap.ker_eq_bot] refine (hK.add_sub_lipschitzWith (LipschitzWith.of_dist_le_mul fun v u => ?_) hg).injective simp only [dist_eq_norm, LinearMap.lsum_apply, Pi.sub_apply, LinearMap.sum_apply, LinearMap.comp_apply, LinearMap.proj_apply, LinearMap.smulRight_apply, LinearMap.id_apply, ← Finset.sum_sub_distrib, ← smul_sub, ← sub_smul, NNReal.coe_sum, coe_nnnorm, Finset.sum_mul] refine norm_sum_le_of_le _ fun i _ => ?_ rw [norm_smul, mul_comm] gcongr exact norm_le_pi_norm (v - u) i #align linear_independent.eventually LinearIndependent.eventually theorem isOpen_setOf_linearIndependent {ι : Type} [Finite ι] : IsOpen { f : ι → E \| LinearIndependent 𝕜 f } := isOpen_iff_mem_nhds.2 fun _ => LinearIndependent.eventually #align is_open_set_of_linear_independent isOpen_setOf_linearIndependent theorem isOpen_setOf_nat_le_rank (n : ℕ) : IsOpen { f : E →L[𝕜] F \| ↑n ≤ (f : E →ₗ[𝕜] F).rank } := by simp only [LinearMap.le_rank_iff_exists_linearIndependent_finset, setOf_exists, ← exists_prop] refine isOpen_biUnion fun t _ => ?_ have : Continuous fun f : E →L[𝕜] F => fun x : (t : Set E) => f x := continuous_pi fun x => (ContinuousLinearMap.apply 𝕜 F (x : E)).continuous exact isOpen_setOf_linearIndependent.preimage this #align is_open_set_of_nat_le_rank isOpen_setOf_nat_le_rank theorem Basis.opNNNorm_le {ι : Type} [Fintype ι] (v : Basis ι 𝕜 E) {u : E →L[𝕜] F} (M : ℝ≥0) (hu : ∀ i, ‖u (v i)‖₊ ≤ M) : ‖u‖₊ ≤ Fintype.card ι • ‖v.equivFunL.toContinuousLinearMap‖₊ * M := u.opNNNorm_le_bound _ fun e => by set φ := v.equivFunL.toContinuousLinearMap calc ‖u e‖₊ = ‖u (∑ i, v.equivFun e i • v i)‖₊ := by rw [v.sum_equivFun] _ = ‖∑ i, v.equivFun e i • (u <\| v i)‖₊ := by simp [map_sum, LinearMap.map_smul] _ ≤ ∑ i, ‖v.equivFun e i • (u <\| v i)‖₊ := nnnorm_sum_le _ _ _ = ∑ i, ‖v.equivFun e i‖₊ * ‖u (v i)‖₊ := by simp only [nnnorm_smul] _ ≤ ∑ i, ‖v.equivFun e i‖₊ * M := by gcongr; apply hu _ = (∑ i, ‖v.equivFun e i‖₊) * M := by rw [Finset.sum_mul] _ ≤ Fintype.card ι • (‖φ‖₊ * ‖e‖₊) * M := by gcongr calc ∑ i, ‖v.equivFun e i‖₊ ≤ Fintype.card ι • ‖φ e‖₊ := Pi.sum_nnnorm_apply_le_nnnorm _ _ ≤ Fintype.card ι • (‖φ‖₊ * ‖e‖₊) := nsmul_le_nsmul_right (φ.le_opNNNorm e) _ _ = Fintype.card ι • ‖φ‖₊ * M * ‖e‖₊ := by simp only [smul_mul_assoc, mul_right_comm] #align basis.op_nnnorm_le Basis.opNNNorm_le @[deprecated (since := "2024-02-02")] alias Basis.op_nnnorm_le := Basis.opNNNorm_le	Mathlib/Analysis/NormedSpace/FiniteDimension.lean	317	320	theorem Basis.opNorm_le {ι : Type} [Fintype ι] (v : Basis ι 𝕜 E) {u : E →L[𝕜] F} {M : ℝ} (hM : 0 ≤ M) (hu : ∀ i, ‖u (v i)‖ ≤ M) : ‖u‖ ≤ Fintype.card ι • ‖v.equivFunL.toContinuousLinearMap‖ M := by	simpa using NNReal.coe_le_coe.mpr (v.opNNNorm_le ⟨M, hM⟩ hu)
import Mathlib.Dynamics.Ergodic.MeasurePreserving import Mathlib.MeasureTheory.Function.SimpleFunc import Mathlib.MeasureTheory.Measure.MutuallySingular import Mathlib.MeasureTheory.Measure.Count import Mathlib.Topology.IndicatorConstPointwise import Mathlib.MeasureTheory.Constructions.BorelSpace.Real #align_import measure_theory.integral.lebesgue from "leanprover-community/mathlib"@"c14c8fcde993801fca8946b0d80131a1a81d1520" assert_not_exists NormedSpace set_option autoImplicit true noncomputable section open Set hiding restrict restrict_apply open Filter ENNReal open Function (support) open scoped Classical open Topology NNReal ENNReal MeasureTheory namespace MeasureTheory local infixr:25 " →ₛ " => SimpleFunc variable {α β γ δ : Type} section Lintegral open SimpleFunc variable {m : MeasurableSpace α} {μ ν : Measure α} irreducible_def lintegral {_ : MeasurableSpace α} (μ : Measure α) (f : α → ℝ≥0∞) : ℝ≥0∞ := ⨆ (g : α →ₛ ℝ≥0∞) (_ : ⇑g ≤ f), g.lintegral μ #align measure_theory.lintegral MeasureTheory.lintegral @[inherit_doc MeasureTheory.lintegral] notation3 "∫⁻ "(...)", "r:60:(scoped f => f)" ∂"μ:70 => lintegral μ r @[inherit_doc MeasureTheory.lintegral] notation3 "∫⁻ "(...)", "r:60:(scoped f => lintegral volume f) => r @[inherit_doc MeasureTheory.lintegral] notation3"∫⁻ "(...)" in "s", "r:60:(scoped f => f)" ∂"μ:70 => lintegral (Measure.restrict μ s) r @[inherit_doc MeasureTheory.lintegral] notation3"∫⁻ "(...)" in "s", "r:60:(scoped f => lintegral (Measure.restrict volume s) f) => r theorem SimpleFunc.lintegral_eq_lintegral {m : MeasurableSpace α} (f : α →ₛ ℝ≥0∞) (μ : Measure α) : ∫⁻ a, f a ∂μ = f.lintegral μ := by rw [MeasureTheory.lintegral] exact le_antisymm (iSup₂_le fun g hg => lintegral_mono hg <\| le_rfl) (le_iSup₂_of_le f le_rfl le_rfl) #align measure_theory.simple_func.lintegral_eq_lintegral MeasureTheory.SimpleFunc.lintegral_eq_lintegral @[mono] theorem lintegral_mono' {m : MeasurableSpace α} ⦃μ ν : Measure α⦄ (hμν : μ ≤ ν) ⦃f g : α → ℝ≥0∞⦄ (hfg : f ≤ g) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂ν := by rw [lintegral, lintegral] exact iSup_mono fun φ => iSup_mono' fun hφ => ⟨le_trans hφ hfg, lintegral_mono (le_refl φ) hμν⟩ #align measure_theory.lintegral_mono' MeasureTheory.lintegral_mono' -- workaround for the known eta-reduction issue with `@[gcongr]` @[gcongr] theorem lintegral_mono_fn' ⦃f g : α → ℝ≥0∞⦄ (hfg : ∀ x, f x ≤ g x) (h2 : μ ≤ ν) : lintegral μ f ≤ lintegral ν g := lintegral_mono' h2 hfg theorem lintegral_mono ⦃f g : α → ℝ≥0∞⦄ (hfg : f ≤ g) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂μ := lintegral_mono' (le_refl μ) hfg #align measure_theory.lintegral_mono MeasureTheory.lintegral_mono -- workaround for the known eta-reduction issue with `@[gcongr]` @[gcongr] theorem lintegral_mono_fn ⦃f g : α → ℝ≥0∞⦄ (hfg : ∀ x, f x ≤ g x) : lintegral μ f ≤ lintegral μ g := lintegral_mono hfg theorem lintegral_mono_nnreal {f g : α → ℝ≥0} (h : f ≤ g) : ∫⁻ a, f a ∂μ ≤ ∫⁻ a, g a ∂μ := lintegral_mono fun a => ENNReal.coe_le_coe.2 (h a) #align measure_theory.lintegral_mono_nnreal MeasureTheory.lintegral_mono_nnreal theorem iSup_lintegral_measurable_le_eq_lintegral (f : α → ℝ≥0∞) : ⨆ (g : α → ℝ≥0∞) (_ : Measurable g) (_ : g ≤ f), ∫⁻ a, g a ∂μ = ∫⁻ a, f a ∂μ := by apply le_antisymm · exact iSup_le fun i => iSup_le fun _ => iSup_le fun h'i => lintegral_mono h'i · rw [lintegral] refine iSup₂_le fun i hi => le_iSup₂_of_le i i.measurable <\| le_iSup_of_le hi ?_ exact le_of_eq (i.lintegral_eq_lintegral _).symm #align measure_theory.supr_lintegral_measurable_le_eq_lintegral MeasureTheory.iSup_lintegral_measurable_le_eq_lintegral theorem lintegral_mono_set {_ : MeasurableSpace α} ⦃μ : Measure α⦄ {s t : Set α} {f : α → ℝ≥0∞} (hst : s ⊆ t) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in t, f x ∂μ := lintegral_mono' (Measure.restrict_mono hst (le_refl μ)) (le_refl f) #align measure_theory.lintegral_mono_set MeasureTheory.lintegral_mono_set theorem lintegral_mono_set' {_ : MeasurableSpace α} ⦃μ : Measure α⦄ {s t : Set α} {f : α → ℝ≥0∞} (hst : s ≤ᵐ[μ] t) : ∫⁻ x in s, f x ∂μ ≤ ∫⁻ x in t, f x ∂μ := lintegral_mono' (Measure.restrict_mono' hst (le_refl μ)) (le_refl f) #align measure_theory.lintegral_mono_set' MeasureTheory.lintegral_mono_set' theorem monotone_lintegral {_ : MeasurableSpace α} (μ : Measure α) : Monotone (lintegral μ) := lintegral_mono #align measure_theory.monotone_lintegral MeasureTheory.monotone_lintegral @[simp] theorem lintegral_const (c : ℝ≥0∞) : ∫⁻ _, c ∂μ = c μ univ := by rw [← SimpleFunc.const_lintegral, ← SimpleFunc.lintegral_eq_lintegral, SimpleFunc.coe_const] rfl #align measure_theory.lintegral_const MeasureTheory.lintegral_const theorem lintegral_zero : ∫⁻ _ : α, 0 ∂μ = 0 := by simp #align measure_theory.lintegral_zero MeasureTheory.lintegral_zero theorem lintegral_zero_fun : lintegral μ (0 : α → ℝ≥0∞) = 0 := lintegral_zero #align measure_theory.lintegral_zero_fun MeasureTheory.lintegral_zero_fun -- @[simp] -- Porting note (#10618): simp can prove this theorem lintegral_one : ∫⁻ _, (1 : ℝ≥0∞) ∂μ = μ univ := by rw [lintegral_const, one_mul] #align measure_theory.lintegral_one MeasureTheory.lintegral_one theorem set_lintegral_const (s : Set α) (c : ℝ≥0∞) : ∫⁻ _ in s, c ∂μ = c * μ s := by rw [lintegral_const, Measure.restrict_apply_univ] #align measure_theory.set_lintegral_const MeasureTheory.set_lintegral_const theorem set_lintegral_one (s) : ∫⁻ _ in s, 1 ∂μ = μ s := by rw [set_lintegral_const, one_mul] #align measure_theory.set_lintegral_one MeasureTheory.set_lintegral_one theorem set_lintegral_const_lt_top [IsFiniteMeasure μ] (s : Set α) {c : ℝ≥0∞} (hc : c ≠ ∞) : ∫⁻ _ in s, c ∂μ < ∞ := by rw [lintegral_const] exact ENNReal.mul_lt_top hc (measure_ne_top (μ.restrict s) univ) #align measure_theory.set_lintegral_const_lt_top MeasureTheory.set_lintegral_const_lt_top theorem lintegral_const_lt_top [IsFiniteMeasure μ] {c : ℝ≥0∞} (hc : c ≠ ∞) : ∫⁻ _, c ∂μ < ∞ := by simpa only [Measure.restrict_univ] using set_lintegral_const_lt_top (univ : Set α) hc #align measure_theory.lintegral_const_lt_top MeasureTheory.lintegral_const_lt_top section variable (μ) theorem exists_measurable_le_lintegral_eq (f : α → ℝ≥0∞) : ∃ g : α → ℝ≥0∞, Measurable g ∧ g ≤ f ∧ ∫⁻ a, f a ∂μ = ∫⁻ a, g a ∂μ := by rcases eq_or_ne (∫⁻ a, f a ∂μ) 0 with h₀ \| h₀ · exact ⟨0, measurable_zero, zero_le f, h₀.trans lintegral_zero.symm⟩ rcases exists_seq_strictMono_tendsto' h₀.bot_lt with ⟨L, _, hLf, hL_tendsto⟩ have : ∀ n, ∃ g : α → ℝ≥0∞, Measurable g ∧ g ≤ f ∧ L n < ∫⁻ a, g a ∂μ := by intro n simpa only [← iSup_lintegral_measurable_le_eq_lintegral f, lt_iSup_iff, exists_prop] using (hLf n).2 choose g hgm hgf hLg using this refine ⟨fun x => ⨆ n, g n x, measurable_iSup hgm, fun x => iSup_le fun n => hgf n x, le_antisymm ?_ ?_⟩ · refine le_of_tendsto' hL_tendsto fun n => (hLg n).le.trans <\| lintegral_mono fun x => ?_ exact le_iSup (fun n => g n x) n · exact lintegral_mono fun x => iSup_le fun n => hgf n x #align measure_theory.exists_measurable_le_lintegral_eq MeasureTheory.exists_measurable_le_lintegral_eq end	Mathlib/MeasureTheory/Integral/Lebesgue.lean	199	220	theorem lintegral_eq_nnreal {m : MeasurableSpace α} (f : α → ℝ≥0∞) (μ : Measure α) : ∫⁻ a, f a ∂μ = ⨆ (φ : α →ₛ ℝ≥0) (_ : ∀ x, ↑(φ x) ≤ f x), (φ.map ((↑) : ℝ≥0 → ℝ≥0∞)).lintegral μ := by	rw [lintegral] refine le_antisymm (iSup₂_le fun φ hφ => ?_) (iSup_mono' fun φ => ⟨φ.map ((↑) : ℝ≥0 → ℝ≥0∞), le_rfl⟩) by_cases h : ∀ᵐ a ∂μ, φ a ≠ ∞ · let ψ := φ.map ENNReal.toNNReal replace h : ψ.map ((↑) : ℝ≥0 → ℝ≥0∞) =ᵐ[μ] φ := h.mono fun a => ENNReal.coe_toNNReal have : ∀ x, ↑(ψ x) ≤ f x := fun x => le_trans ENNReal.coe_toNNReal_le_self (hφ x) exact le_iSup_of_le (φ.map ENNReal.toNNReal) (le_iSup_of_le this (ge_of_eq <\| lintegral_congr h)) · have h_meas : μ (φ ⁻¹' {∞}) ≠ 0 := mt measure_zero_iff_ae_nmem.1 h refine le_trans le_top (ge_of_eq <\| (iSup_eq_top _).2 fun b hb => ?_) obtain ⟨n, hn⟩ : ∃ n : ℕ, b < n * μ (φ ⁻¹' {∞}) := exists_nat_mul_gt h_meas (ne_of_lt hb) use (const α (n : ℝ≥0)).restrict (φ ⁻¹' {∞}) simp only [lt_iSup_iff, exists_prop, coe_restrict, φ.measurableSet_preimage, coe_const, ENNReal.coe_indicator, map_coe_ennreal_restrict, SimpleFunc.map_const, ENNReal.coe_natCast, restrict_const_lintegral] refine ⟨indicator_le fun x hx => le_trans ?_ (hφ _), hn⟩ simp only [mem_preimage, mem_singleton_iff] at hx simp only [hx, le_top]
import Mathlib.Analysis.SpecialFunctions.Trigonometric.Angle import Mathlib.Analysis.SpecialFunctions.Trigonometric.Inverse #align_import analysis.special_functions.complex.arg from "leanprover-community/mathlib"@"2c1d8ca2812b64f88992a5294ea3dba144755cd1" open Filter Metric Set open scoped ComplexConjugate Real Topology namespace Complex variable {a x z : ℂ} noncomputable def arg (x : ℂ) : ℝ := if 0 ≤ x.re then Real.arcsin (x.im / abs x) else if 0 ≤ x.im then Real.arcsin ((-x).im / abs x) + π else Real.arcsin ((-x).im / abs x) - π #align complex.arg Complex.arg theorem sin_arg (x : ℂ) : Real.sin (arg x) = x.im / abs x := by unfold arg; split_ifs <;> simp [sub_eq_add_neg, arg, Real.sin_arcsin (abs_le.1 (abs_im_div_abs_le_one x)).1 (abs_le.1 (abs_im_div_abs_le_one x)).2, Real.sin_add, neg_div, Real.arcsin_neg, Real.sin_neg] #align complex.sin_arg Complex.sin_arg theorem cos_arg {x : ℂ} (hx : x ≠ 0) : Real.cos (arg x) = x.re / abs x := by rw [arg] split_ifs with h₁ h₂ · rw [Real.cos_arcsin] field_simp [Real.sqrt_sq, (abs.pos 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), ] #align complex.cos_arg Complex.cos_arg @[simp] theorem abs_mul_exp_arg_mul_I (x : ℂ) : ↑(abs x) exp (arg x * I) = x := by rcases eq_or_ne x 0 with (rfl \| hx) · simp · have : abs x ≠ 0 := abs.ne_zero hx apply Complex.ext <;> field_simp [sin_arg, cos_arg hx, this, mul_comm (abs x)] set_option linter.uppercaseLean3 false in #align complex.abs_mul_exp_arg_mul_I Complex.abs_mul_exp_arg_mul_I @[simp] theorem abs_mul_cos_add_sin_mul_I (x : ℂ) : (abs x * (cos (arg x) + sin (arg x) * I) : ℂ) = x := by rw [← exp_mul_I, abs_mul_exp_arg_mul_I] set_option linter.uppercaseLean3 false in #align complex.abs_mul_cos_add_sin_mul_I Complex.abs_mul_cos_add_sin_mul_I @[simp] lemma abs_mul_cos_arg (x : ℂ) : abs x * Real.cos (arg x) = x.re := by simpa [-abs_mul_cos_add_sin_mul_I] using congr_arg re (abs_mul_cos_add_sin_mul_I x) @[simp] lemma abs_mul_sin_arg (x : ℂ) : abs x * Real.sin (arg x) = x.im := by simpa [-abs_mul_cos_add_sin_mul_I] using congr_arg im (abs_mul_cos_add_sin_mul_I x) theorem abs_eq_one_iff (z : ℂ) : abs z = 1 ↔ ∃ θ : ℝ, exp (θ * I) = z := by refine ⟨fun hz => ⟨arg z, ?_⟩, ?_⟩ · calc exp (arg z * I) = abs z * exp (arg z * I) := by rw [hz, ofReal_one, one_mul] _ = z := abs_mul_exp_arg_mul_I z · rintro ⟨θ, rfl⟩ exact Complex.abs_exp_ofReal_mul_I θ #align complex.abs_eq_one_iff Complex.abs_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_abs, abs_eq_one_iff, Set.mem_range] set_option linter.uppercaseLean3 false in #align complex.range_exp_mul_I Complex.range_exp_mul_I 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, map_mul, abs_cos_add_sin_mul_I, abs_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 cases' 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] set_option linter.uppercaseLean3 false in #align complex.arg_mul_cos_add_sin_mul_I Complex.arg_mul_cos_add_sin_mul_I 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] set_option linter.uppercaseLean3 false in #align complex.arg_cos_add_sin_mul_I Complex.arg_cos_add_sin_mul_I 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] #align complex.arg_zero Complex.arg_zero theorem ext_abs_arg {x y : ℂ} (h₁ : abs x = abs y) (h₂ : x.arg = y.arg) : x = y := by rw [← abs_mul_exp_arg_mul_I x, ← abs_mul_exp_arg_mul_I y, h₁, h₂] #align complex.ext_abs_arg Complex.ext_abs_arg theorem ext_abs_arg_iff {x y : ℂ} : x = y ↔ abs x = abs y ∧ arg x = arg y := ⟨fun h => h ▸ ⟨rfl, rfl⟩, and_imp.2 ext_abs_arg⟩ #align complex.ext_abs_arg_iff Complex.ext_abs_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 [← abs_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 (abs.pos hz) hN push_cast at this rwa [this] #align complex.arg_mem_Ioc Complex.arg_mem_Ioc @[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⟩ #align complex.range_arg Complex.range_arg theorem arg_le_pi (x : ℂ) : arg x ≤ π := (arg_mem_Ioc x).2 #align complex.arg_le_pi Complex.arg_le_pi theorem neg_pi_lt_arg (x : ℂ) : -π < arg x := (arg_mem_Ioc x).1 #align complex.neg_pi_lt_arg Complex.neg_pi_lt_arg theorem abs_arg_le_pi (z : ℂ) : \|arg z\| ≤ π := abs_le.2 ⟨(neg_pi_lt_arg z).le, arg_le_pi z⟩ #align complex.abs_arg_le_pi Complex.abs_arg_le_pi @[simp] theorem arg_nonneg_iff {z : ℂ} : 0 ≤ arg z ↔ 0 ≤ z.im := by rcases eq_or_ne z 0 with (rfl \| h₀); · simp calc 0 ≤ arg z ↔ 0 ≤ Real.sin (arg z) := ⟨fun h => Real.sin_nonneg_of_mem_Icc ⟨h, arg_le_pi z⟩, by contrapose! intro h exact Real.sin_neg_of_neg_of_neg_pi_lt h (neg_pi_lt_arg _)⟩ _ ↔ _ := by rw [sin_arg, le_div_iff (abs.pos h₀), zero_mul] #align complex.arg_nonneg_iff Complex.arg_nonneg_iff @[simp] theorem arg_neg_iff {z : ℂ} : arg z < 0 ↔ z.im < 0 := lt_iff_lt_of_le_iff_le arg_nonneg_iff #align complex.arg_neg_iff Complex.arg_neg_iff theorem arg_real_mul (x : ℂ) {r : ℝ} (hr : 0 < r) : arg (r * x) = arg x := by rcases eq_or_ne x 0 with (rfl \| hx); · rw [mul_zero] conv_lhs => rw [← abs_mul_cos_add_sin_mul_I x, ← mul_assoc, ← ofReal_mul, arg_mul_cos_add_sin_mul_I (mul_pos hr (abs.pos hx)) x.arg_mem_Ioc] #align complex.arg_real_mul Complex.arg_real_mul theorem arg_mul_real {r : ℝ} (hr : 0 < r) (x : ℂ) : arg (x * r) = arg x := mul_comm x r ▸ arg_real_mul x hr theorem arg_eq_arg_iff {x y : ℂ} (hx : x ≠ 0) (hy : y ≠ 0) : arg x = arg y ↔ (abs y / abs x : ℂ) * x = y := by simp only [ext_abs_arg_iff, map_mul, map_div₀, abs_ofReal, abs_abs, div_mul_cancel₀ _ (abs.ne_zero hx), eq_self_iff_true, true_and_iff] rw [← ofReal_div, arg_real_mul] exact div_pos (abs.pos hy) (abs.pos hx) #align complex.arg_eq_arg_iff Complex.arg_eq_arg_iff @[simp] theorem arg_one : arg 1 = 0 := by simp [arg, zero_le_one] #align complex.arg_one Complex.arg_one @[simp] theorem arg_neg_one : arg (-1) = π := by simp [arg, le_refl, not_le.2 (zero_lt_one' ℝ)] #align complex.arg_neg_one Complex.arg_neg_one @[simp] theorem arg_I : arg I = π / 2 := by simp [arg, le_refl] set_option linter.uppercaseLean3 false in #align complex.arg_I Complex.arg_I @[simp]	Mathlib/Analysis/SpecialFunctions/Complex/Arg.lean	222	222	theorem arg_neg_I : arg (-I) = -(π / 2) := by	simp [arg, le_refl]
import Mathlib.Data.Finset.Prod import Mathlib.Data.Set.Finite #align_import data.finset.n_ary from "leanprover-community/mathlib"@"eba7871095e834365616b5e43c8c7bb0b37058d0" open Function Set variable {α α' β β' γ γ' δ δ' ε ε' ζ ζ' ν : Type} namespace Finset variable [DecidableEq α'] [DecidableEq β'] [DecidableEq γ] [DecidableEq γ'] [DecidableEq δ] [DecidableEq δ'] [DecidableEq ε] [DecidableEq ε'] {f f' : α → β → γ} {g g' : α → β → γ → δ} {s s' : Finset α} {t t' : Finset β} {u u' : Finset γ} {a a' : α} {b b' : β} {c : γ} def image₂ (f : α → β → γ) (s : Finset α) (t : Finset β) : Finset γ := (s ×ˢ t).image <\| uncurry f #align finset.image₂ Finset.image₂ @[simp] theorem mem_image₂ : c ∈ image₂ f s t ↔ ∃ a ∈ s, ∃ b ∈ t, f a b = c := by simp [image₂, and_assoc] #align finset.mem_image₂ Finset.mem_image₂ @[simp, norm_cast] theorem coe_image₂ (f : α → β → γ) (s : Finset α) (t : Finset β) : (image₂ f s t : Set γ) = Set.image2 f s t := Set.ext fun _ => mem_image₂ #align finset.coe_image₂ Finset.coe_image₂ theorem card_image₂_le (f : α → β → γ) (s : Finset α) (t : Finset β) : (image₂ f s t).card ≤ s.card t.card := card_image_le.trans_eq <\| card_product _ _ #align finset.card_image₂_le Finset.card_image₂_le theorem card_image₂_iff : (image₂ f s t).card = s.card * t.card ↔ (s ×ˢ t : Set (α × β)).InjOn fun x => f x.1 x.2 := by rw [← card_product, ← coe_product] exact card_image_iff #align finset.card_image₂_iff Finset.card_image₂_iff theorem card_image₂ (hf : Injective2 f) (s : Finset α) (t : Finset β) : (image₂ f s t).card = s.card * t.card := (card_image_of_injective _ hf.uncurry).trans <\| card_product _ _ #align finset.card_image₂ Finset.card_image₂ theorem mem_image₂_of_mem (ha : a ∈ s) (hb : b ∈ t) : f a b ∈ image₂ f s t := mem_image₂.2 ⟨a, ha, b, hb, rfl⟩ #align finset.mem_image₂_of_mem Finset.mem_image₂_of_mem theorem mem_image₂_iff (hf : Injective2 f) : f a b ∈ image₂ f s t ↔ a ∈ s ∧ b ∈ t := by rw [← mem_coe, coe_image₂, mem_image2_iff hf, mem_coe, mem_coe] #align finset.mem_image₂_iff Finset.mem_image₂_iff theorem image₂_subset (hs : s ⊆ s') (ht : t ⊆ t') : image₂ f s t ⊆ image₂ f s' t' := by rw [← coe_subset, coe_image₂, coe_image₂] exact image2_subset hs ht #align finset.image₂_subset Finset.image₂_subset theorem image₂_subset_left (ht : t ⊆ t') : image₂ f s t ⊆ image₂ f s t' := image₂_subset Subset.rfl ht #align finset.image₂_subset_left Finset.image₂_subset_left theorem image₂_subset_right (hs : s ⊆ s') : image₂ f s t ⊆ image₂ f s' t := image₂_subset hs Subset.rfl #align finset.image₂_subset_right Finset.image₂_subset_right theorem image_subset_image₂_left (hb : b ∈ t) : s.image (fun a => f a b) ⊆ image₂ f s t := image_subset_iff.2 fun _ ha => mem_image₂_of_mem ha hb #align finset.image_subset_image₂_left Finset.image_subset_image₂_left theorem image_subset_image₂_right (ha : a ∈ s) : t.image (fun b => f a b) ⊆ image₂ f s t := image_subset_iff.2 fun _ => mem_image₂_of_mem ha #align finset.image_subset_image₂_right Finset.image_subset_image₂_right theorem forall_image₂_iff {p : γ → Prop} : (∀ z ∈ image₂ f s t, p z) ↔ ∀ x ∈ s, ∀ y ∈ t, p (f x y) := by simp_rw [← mem_coe, coe_image₂, forall_image2_iff] #align finset.forall_image₂_iff Finset.forall_image₂_iff @[simp] theorem image₂_subset_iff : image₂ f s t ⊆ u ↔ ∀ x ∈ s, ∀ y ∈ t, f x y ∈ u := forall_image₂_iff #align finset.image₂_subset_iff Finset.image₂_subset_iff theorem image₂_subset_iff_left : image₂ f s t ⊆ u ↔ ∀ a ∈ s, (t.image fun b => f a b) ⊆ u := by simp_rw [image₂_subset_iff, image_subset_iff] #align finset.image₂_subset_iff_left Finset.image₂_subset_iff_left theorem image₂_subset_iff_right : image₂ f s t ⊆ u ↔ ∀ b ∈ t, (s.image fun a => f a b) ⊆ u := by simp_rw [image₂_subset_iff, image_subset_iff, @forall₂_swap α] #align finset.image₂_subset_iff_right Finset.image₂_subset_iff_right @[simp, aesop safe apply (rule_sets := [finsetNonempty])] theorem image₂_nonempty_iff : (image₂ f s t).Nonempty ↔ s.Nonempty ∧ t.Nonempty := by rw [← coe_nonempty, coe_image₂] exact image2_nonempty_iff #align finset.image₂_nonempty_iff Finset.image₂_nonempty_iff theorem Nonempty.image₂ (hs : s.Nonempty) (ht : t.Nonempty) : (image₂ f s t).Nonempty := image₂_nonempty_iff.2 ⟨hs, ht⟩ #align finset.nonempty.image₂ Finset.Nonempty.image₂ theorem Nonempty.of_image₂_left (h : (s.image₂ f t).Nonempty) : s.Nonempty := (image₂_nonempty_iff.1 h).1 #align finset.nonempty.of_image₂_left Finset.Nonempty.of_image₂_left theorem Nonempty.of_image₂_right (h : (s.image₂ f t).Nonempty) : t.Nonempty := (image₂_nonempty_iff.1 h).2 #align finset.nonempty.of_image₂_right Finset.Nonempty.of_image₂_right @[simp] theorem image₂_empty_left : image₂ f ∅ t = ∅ := coe_injective <\| by simp #align finset.image₂_empty_left Finset.image₂_empty_left @[simp] theorem image₂_empty_right : image₂ f s ∅ = ∅ := coe_injective <\| by simp #align finset.image₂_empty_right Finset.image₂_empty_right @[simp]	Mathlib/Data/Finset/NAry.lean	145	146	theorem image₂_eq_empty_iff : image₂ f s t = ∅ ↔ s = ∅ ∨ t = ∅ := by	simp_rw [← not_nonempty_iff_eq_empty, image₂_nonempty_iff, not_and_or]
import Mathlib.Algebra.BigOperators.Intervals import Mathlib.Algebra.BigOperators.Ring.List import Mathlib.Data.Int.ModEq import Mathlib.Data.Nat.Bits import Mathlib.Data.Nat.Log import Mathlib.Data.List.Indexes import Mathlib.Data.List.Palindrome import Mathlib.Tactic.IntervalCases import Mathlib.Tactic.Linarith import Mathlib.Tactic.Ring #align_import data.nat.digits from "leanprover-community/mathlib"@"369525b73f229ccd76a6ec0e0e0bf2be57599768" namespace Nat variable {n : ℕ} def digitsAux0 : ℕ → List ℕ \| 0 => [] \| n + 1 => [n + 1] #align nat.digits_aux_0 Nat.digitsAux0 def digitsAux1 (n : ℕ) : List ℕ := List.replicate n 1 #align nat.digits_aux_1 Nat.digitsAux1 def digitsAux (b : ℕ) (h : 2 ≤ b) : ℕ → List ℕ \| 0 => [] \| n + 1 => ((n + 1) % b) :: digitsAux b h ((n + 1) / b) decreasing_by exact Nat.div_lt_self (Nat.succ_pos _) h #align nat.digits_aux Nat.digitsAux @[simp] theorem digitsAux_zero (b : ℕ) (h : 2 ≤ b) : digitsAux b h 0 = [] := by rw [digitsAux] #align nat.digits_aux_zero Nat.digitsAux_zero theorem digitsAux_def (b : ℕ) (h : 2 ≤ b) (n : ℕ) (w : 0 < n) : digitsAux b h n = (n % b) :: digitsAux b h (n / b) := by cases n · cases w · rw [digitsAux] #align nat.digits_aux_def Nat.digitsAux_def def digits : ℕ → ℕ → List ℕ \| 0 => digitsAux0 \| 1 => digitsAux1 \| b + 2 => digitsAux (b + 2) (by norm_num) #align nat.digits Nat.digits @[simp] theorem digits_zero (b : ℕ) : digits b 0 = [] := by rcases b with (_ \| ⟨_ \| ⟨_⟩⟩) <;> simp [digits, digitsAux0, digitsAux1] #align nat.digits_zero Nat.digits_zero -- @[simp] -- Porting note (#10618): simp can prove this theorem digits_zero_zero : digits 0 0 = [] := rfl #align nat.digits_zero_zero Nat.digits_zero_zero @[simp] theorem digits_zero_succ (n : ℕ) : digits 0 n.succ = [n + 1] := rfl #align nat.digits_zero_succ Nat.digits_zero_succ theorem digits_zero_succ' : ∀ {n : ℕ}, n ≠ 0 → digits 0 n = [n] \| 0, h => (h rfl).elim \| _ + 1, _ => rfl #align nat.digits_zero_succ' Nat.digits_zero_succ' @[simp] theorem digits_one (n : ℕ) : digits 1 n = List.replicate n 1 := rfl #align nat.digits_one Nat.digits_one -- @[simp] -- Porting note (#10685): dsimp can prove this theorem digits_one_succ (n : ℕ) : digits 1 (n + 1) = 1 :: digits 1 n := rfl #align nat.digits_one_succ Nat.digits_one_succ theorem digits_add_two_add_one (b n : ℕ) : digits (b + 2) (n + 1) = ((n + 1) % (b + 2)) :: digits (b + 2) ((n + 1) / (b + 2)) := by simp [digits, digitsAux_def] #align nat.digits_add_two_add_one Nat.digits_add_two_add_one @[simp] lemma digits_of_two_le_of_pos {b : ℕ} (hb : 2 ≤ b) (hn : 0 < n) : Nat.digits b n = n % b :: Nat.digits b (n / b) := by rw [Nat.eq_add_of_sub_eq hb rfl, Nat.eq_add_of_sub_eq hn rfl, Nat.digits_add_two_add_one] theorem digits_def' : ∀ {b : ℕ} (_ : 1 < b) {n : ℕ} (_ : 0 < n), digits b n = (n % b) :: digits b (n / b) \| 0, h => absurd h (by decide) \| 1, h => absurd h (by decide) \| b + 2, _ => digitsAux_def _ (by simp) _ #align nat.digits_def' Nat.digits_def' @[simp] theorem digits_of_lt (b x : ℕ) (hx : x ≠ 0) (hxb : x < b) : digits b x = [x] := by rcases exists_eq_succ_of_ne_zero hx with ⟨x, rfl⟩ rcases Nat.exists_eq_add_of_le' ((Nat.le_add_left 1 x).trans_lt hxb) with ⟨b, rfl⟩ rw [digits_add_two_add_one, div_eq_of_lt hxb, digits_zero, mod_eq_of_lt hxb] #align nat.digits_of_lt Nat.digits_of_lt theorem digits_add (b : ℕ) (h : 1 < b) (x y : ℕ) (hxb : x < b) (hxy : x ≠ 0 ∨ y ≠ 0) : digits b (x + b * y) = x :: digits b y := by rcases Nat.exists_eq_add_of_le' h with ⟨b, rfl : _ = _ + 2⟩ cases y · simp [hxb, hxy.resolve_right (absurd rfl)] dsimp [digits] rw [digitsAux_def] · congr · simp [Nat.add_mod, mod_eq_of_lt hxb] · simp [add_mul_div_left, div_eq_of_lt hxb] · apply Nat.succ_pos #align nat.digits_add Nat.digits_add -- If we had a function converting a list into a polynomial, -- and appropriate lemmas about that function, -- we could rewrite this in terms of that. def ofDigits {α : Type} [Semiring α] (b : α) : List ℕ → α \| [] => 0 \| h :: t => h + b ofDigits b t #align nat.of_digits Nat.ofDigits theorem ofDigits_eq_foldr {α : Type} [Semiring α] (b : α) (L : List ℕ) : ofDigits b L = List.foldr (fun x y => ↑x + b y) 0 L := by induction' L with d L ih · rfl · dsimp [ofDigits] rw [ih] #align nat.of_digits_eq_foldr Nat.ofDigits_eq_foldr theorem ofDigits_eq_sum_map_with_index_aux (b : ℕ) (l : List ℕ) : ((List.range l.length).zipWith ((fun i a : ℕ => a * b ^ (i + 1))) l).sum = b * ((List.range l.length).zipWith (fun i a => a * b ^ i) l).sum := by suffices (List.range l.length).zipWith (fun i a : ℕ => a * b ^ (i + 1)) l = (List.range l.length).zipWith (fun i a => b * (a * b ^ i)) l by simp [this] congr; ext; simp [pow_succ]; ring #align nat.of_digits_eq_sum_map_with_index_aux Nat.ofDigits_eq_sum_map_with_index_aux theorem ofDigits_eq_sum_mapIdx (b : ℕ) (L : List ℕ) : ofDigits b L = (L.mapIdx fun i a => a * b ^ i).sum := by rw [List.mapIdx_eq_enum_map, List.enum_eq_zip_range, List.map_uncurry_zip_eq_zipWith, ofDigits_eq_foldr] induction' L with hd tl hl · simp · simpa [List.range_succ_eq_map, List.zipWith_map_left, ofDigits_eq_sum_map_with_index_aux] using Or.inl hl #align nat.of_digits_eq_sum_map_with_index Nat.ofDigits_eq_sum_mapIdx @[simp] theorem ofDigits_nil {b : ℕ} : ofDigits b [] = 0 := rfl @[simp] theorem ofDigits_singleton {b n : ℕ} : ofDigits b [n] = n := by simp [ofDigits] #align nat.of_digits_singleton Nat.ofDigits_singleton @[simp] theorem ofDigits_one_cons {α : Type} [Semiring α] (h : ℕ) (L : List ℕ) : ofDigits (1 : α) (h :: L) = h + ofDigits 1 L := by simp [ofDigits] #align nat.of_digits_one_cons Nat.ofDigits_one_cons theorem ofDigits_cons {b hd} {tl : List ℕ} : ofDigits b (hd :: tl) = hd + b ofDigits b tl := rfl theorem ofDigits_append {b : ℕ} {l1 l2 : List ℕ} : ofDigits b (l1 ++ l2) = ofDigits b l1 + b ^ l1.length * ofDigits b l2 := by induction' l1 with hd tl IH · simp [ofDigits] · rw [ofDigits, List.cons_append, ofDigits, IH, List.length_cons, pow_succ'] ring #align nat.of_digits_append Nat.ofDigits_append @[norm_cast] theorem coe_ofDigits (α : Type*) [Semiring α] (b : ℕ) (L : List ℕ) : ((ofDigits b L : ℕ) : α) = ofDigits (b : α) L := by induction' L with d L ih · simp [ofDigits] · dsimp [ofDigits]; push_cast; rw [ih] #align nat.coe_of_digits Nat.coe_ofDigits @[norm_cast] theorem coe_int_ofDigits (b : ℕ) (L : List ℕ) : ((ofDigits b L : ℕ) : ℤ) = ofDigits (b : ℤ) L := by induction' L with d L _ · rfl · dsimp [ofDigits]; push_cast; simp only #align nat.coe_int_of_digits Nat.coe_int_ofDigits theorem digits_zero_of_eq_zero {b : ℕ} (h : b ≠ 0) : ∀ {L : List ℕ} (_ : ofDigits b L = 0), ∀ l ∈ L, l = 0 \| _ :: _, h0, _, List.Mem.head .. => Nat.eq_zero_of_add_eq_zero_right h0 \| _ :: _, h0, _, List.Mem.tail _ hL => digits_zero_of_eq_zero h (mul_right_injective₀ h (Nat.eq_zero_of_add_eq_zero_left h0)) _ hL #align nat.digits_zero_of_eq_zero Nat.digits_zero_of_eq_zero theorem digits_ofDigits (b : ℕ) (h : 1 < b) (L : List ℕ) (w₁ : ∀ l ∈ L, l < b) (w₂ : ∀ h : L ≠ [], L.getLast h ≠ 0) : digits b (ofDigits b L) = L := by induction' L with d L ih · dsimp [ofDigits] simp · dsimp [ofDigits] replace w₂ := w₂ (by simp) rw [digits_add b h] · rw [ih] · intro l m apply w₁ exact List.mem_cons_of_mem _ m · intro h rw [List.getLast_cons h] at w₂ convert w₂ · exact w₁ d (List.mem_cons_self _ _) · by_cases h' : L = [] · rcases h' with rfl left simpa using w₂ · right contrapose! w₂ refine digits_zero_of_eq_zero h.ne_bot w₂ _ ?_ rw [List.getLast_cons h'] exact List.getLast_mem h' #align nat.digits_of_digits Nat.digits_ofDigits	Mathlib/Data/Nat/Digits.lean	267	287	theorem ofDigits_digits (b n : ℕ) : ofDigits b (digits b n) = n := by	cases' b with b · cases' n with n · rfl · change ofDigits 0 [n + 1] = n + 1 dsimp [ofDigits] · cases' b with b · induction' n with n ih · rfl · rw [Nat.zero_add] at ih ⊢ simp only [ih, add_comm 1, ofDigits_one_cons, Nat.cast_id, digits_one_succ] · apply Nat.strongInductionOn n _ clear n intro n h cases n · rw [digits_zero] rfl · simp only [Nat.succ_eq_add_one, digits_add_two_add_one] dsimp [ofDigits] rw [h _ (Nat.div_lt_self' _ b)] rw [Nat.mod_add_div]
import Mathlib.Algebra.NeZero import Mathlib.Data.Nat.Defs import Mathlib.Logic.Embedding.Basic import Mathlib.Logic.Equiv.Set import Mathlib.Tactic.Common #align_import data.fin.basic from "leanprover-community/mathlib"@"3a2b5524a138b5d0b818b858b516d4ac8a484b03" assert_not_exists Monoid universe u v open Fin Nat Function def finZeroElim {α : Fin 0 → Sort} (x : Fin 0) : α x := x.elim0 #align fin_zero_elim finZeroElim namespace Fin instance {n : ℕ} : CanLift ℕ (Fin n) Fin.val (· < n) where prf k hk := ⟨⟨k, hk⟩, rfl⟩ def rec0 {α : Fin 0 → Sort} (i : Fin 0) : α i := absurd i.2 (Nat.not_lt_zero _) #align fin.elim0' Fin.elim0 variable {n m : ℕ} --variable {a b : Fin n} -- this really breaks stuff #align fin.fin_to_nat Fin.coeToNat theorem val_injective : Function.Injective (@Fin.val n) := @Fin.eq_of_val_eq n #align fin.val_injective Fin.val_injective 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 #align fin.prop Fin.prop #align fin.is_lt Fin.is_lt #align fin.pos Fin.pos #align fin.pos_iff_nonempty Fin.pos_iff_nonempty 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 @[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 #align fin.equiv_subtype Fin.equivSubtype #align fin.equiv_subtype_symm_apply Fin.equivSubtype_symm_apply #align fin.equiv_subtype_apply Fin.equivSubtype_apply section Add #align fin.val_one Fin.val_one #align fin.coe_one Fin.val_one @[simp] theorem val_one' (n : ℕ) [NeZero n] : ((1 : Fin n) : ℕ) = 1 % n := rfl #align fin.coe_one' Fin.val_one' -- Porting note: Delete this lemma after porting theorem val_one'' {n : ℕ} : ((1 : Fin (n + 1)) : ℕ) = 1 % (n + 1) := rfl #align fin.one_val Fin.val_one'' #align fin.mk_one Fin.mk_one 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 [← Nat.one_eq_succ_zero, Fin.nontrivial, not_nontrivial, Nat.succ_le_iff] -- Porting note: here and in the next lemma, had to use `← Nat.one_eq_succ_zero`. #align fin.nontrivial_iff_two_le Fin.nontrivial_iff_two_le #align fin.subsingleton_iff_le_one Fin.subsingleton_iff_le_one section Monoid -- Porting note (#10618): removing `simp`, `simp` can prove it with AddCommMonoid instance protected theorem add_zero [NeZero n] (k : Fin n) : k + 0 = k := by simp only [add_def, val_zero', Nat.add_zero, mod_eq_of_lt (is_lt k)] #align fin.add_zero Fin.add_zero -- Porting note (#10618): removing `simp`, `simp` can prove it with AddCommMonoid instance protected theorem zero_add [NeZero n] (k : Fin n) : 0 + k = k := by simp [ext_iff, add_def, mod_eq_of_lt (is_lt k)] #align fin.zero_add Fin.zero_add instance {a : ℕ} [NeZero n] : OfNat (Fin n) a where ofNat := Fin.ofNat' a n.pos_of_neZero instance inhabited (n : ℕ) [NeZero n] : Inhabited (Fin n) := ⟨0⟩ 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 #align fin.default_eq_zero Fin.default_eq_zero #align fin.val_add Fin.val_add #align fin.coe_add Fin.val_add 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)] #align fin.coe_add_eq_ite Fin.val_add_eq_ite #align fin.coe_add_one_of_lt Fin.val_add_one_of_lt #align fin.last_add_one Fin.last_add_one #align fin.coe_add_one Fin.val_add_one #align fin.val_two Fin.val_two --- Porting note: syntactically the same as the above #align fin.coe_two Fin.val_two section Succ #align fin.coe_succ Fin.val_succ #align fin.succ_pos Fin.succ_pos lemma succ_injective (n : ℕ) : Injective (@Fin.succ n) := fun a b ↦ by simp [ext_iff] #align fin.succ_injective Fin.succ_injective def succEmb (n : ℕ) : Fin n ↪ Fin (n + 1) where toFun := succ inj' := succ_injective _ @[simp] theorem val_succEmb : ⇑(succEmb n) = Fin.succ := rfl #align fin.succ_le_succ_iff Fin.succ_le_succ_iff #align fin.succ_lt_succ_iff Fin.succ_lt_succ_iff @[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⟩)⟩ #align fin.exists_succ_eq_iff Fin.exists_succ_eq theorem exists_succ_eq_of_ne_zero {x : Fin (n + 1)} (h : x ≠ 0) : ∃ y, Fin.succ y = x := exists_succ_eq.mpr h #align fin.succ_inj Fin.succ_inj #align fin.succ_ne_zero Fin.succ_ne_zero @[simp] theorem succ_zero_eq_one' [NeZero n] : Fin.succ (0 : Fin n) = 1 := by cases n · exact (NeZero.ne 0 rfl).elim · rfl #align fin.succ_zero_eq_one Fin.succ_zero_eq_one' 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' #align fin.succ_zero_eq_one' Fin.succ_zero_eq_one @[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 #align fin.succ_one_eq_two Fin.succ_one_eq_two' -- Version of `succ_one_eq_two` to be used by `dsimp`. -- Note the `'` swapped around due to a move to std4. #align fin.succ_one_eq_two' Fin.succ_one_eq_two #align fin.succ_mk Fin.succ_mk #align fin.mk_succ_pos Fin.mk_succ_pos #align fin.one_lt_succ_succ Fin.one_lt_succ_succ #align fin.add_one_lt_iff Fin.add_one_lt_iff #align fin.add_one_le_iff Fin.add_one_le_iff #align fin.last_le_iff Fin.last_le_iff #align fin.lt_add_one_iff Fin.lt_add_one_iff @[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 _⟩ #align fin.le_zero_iff Fin.le_zero_iff' #align fin.succ_succ_ne_one Fin.succ_succ_ne_one #align fin.cast_lt Fin.castLT #align fin.coe_cast_lt Fin.coe_castLT #align fin.cast_lt_mk Fin.castLT_mk -- Move to Batteries? @[simp] theorem cast_refl {n : Nat} (h : n = n) : Fin.cast h = id := rfl -- 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 [ext_iff] @[simp] lemma castAdd_inj {a b : Fin m} : castAdd n a = castAdd n b ↔ a = b := by simp [ext_iff] attribute [simp] castSucc_inj lemma castLE_injective (hmn : m ≤ n) : Injective (castLE hmn) := fun a b hab ↦ ext (by have := congr_arg val hab; exact this) lemma castAdd_injective (m n : ℕ) : Injective (@Fin.castAdd m n) := castLE_injective _ lemma castSucc_injective (n : ℕ) : Injective (@Fin.castSucc n) := castAdd_injective _ _ #align fin.cast_succ_injective Fin.castSucc_injective @[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 #align fin.coe_cast_le Fin.coe_castLE #align fin.cast_le_mk Fin.castLE_mk #align fin.cast_le_zero Fin.castLE_zero assert_not_exists Fintype 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 => cases' h with e 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 _⟩⟩ #align fin.equiv_iff_eq Fin.equiv_iff_eq @[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⟩, Fin.ext rfl⟩⟩ #align fin.range_cast_le Fin.range_castLE @[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 _ _) #align fin.coe_of_injective_cast_le_symm Fin.coe_of_injective_castLE_symm #align fin.cast_le_succ Fin.castLE_succ #align fin.cast_le_cast_le Fin.castLE_castLE #align fin.cast_le_comp_cast_le Fin.castLE_comp_castLE theorem leftInverse_cast (eq : n = m) : LeftInverse (cast eq.symm) (cast eq) := fun _ => rfl theorem rightInverse_cast (eq : n = m) : RightInverse (cast eq.symm) (cast eq) := fun _ => rfl theorem cast_le_cast (eq : n = m) {a b : Fin n} : cast eq a ≤ cast eq b ↔ a ≤ b := Iff.rfl @[simps] def _root_.finCongr (eq : n = m) : Fin n ≃ Fin m where toFun := cast eq invFun := cast eq.symm left_inv := leftInverse_cast eq right_inv := rightInverse_cast eq #align fin_congr finCongr @[simp] lemma _root_.finCongr_apply_mk (h : m = n) (k : ℕ) (hk : k < m) : finCongr h ⟨k, hk⟩ = ⟨k, h ▸ hk⟩ := rfl #align fin_congr_apply_mk finCongr_apply_mk @[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 #align fin_congr_symm finCongr_symm @[simp] lemma _root_.finCongr_apply_coe (h : m = n) (k : Fin m) : (finCongr h k : ℕ) = k := rfl #align fin_congr_apply_coe finCongr_apply_coe lemma _root_.finCongr_symm_apply_coe (h : m = n) (k : Fin n) : ((finCongr h).symm k : ℕ) = k := rfl #align fin_congr_symm_apply_coe finCongr_symm_apply_coe lemma _root_.finCongr_eq_equivCast (h : n = m) : finCongr h = .cast (h ▸ rfl) := by subst h; simp #align fin.coe_cast Fin.coe_castₓ @[simp] theorem cast_zero {n' : ℕ} [NeZero n] {h : n = n'} : cast h (0 : Fin n) = by { haveI : NeZero n' := by {rw [← h]; infer_instance}; exact 0} := ext rfl #align fin.cast_zero Fin.cast_zero #align fin.cast_last Fin.cast_lastₓ #align fin.cast_mk Fin.cast_mkₓ #align fin.cast_trans Fin.cast_transₓ #align fin.cast_le_of_eq Fin.castLE_of_eq theorem cast_eq_cast (h : n = m) : (cast h : Fin n → Fin m) = _root_.cast (h ▸ rfl) := by subst h ext rfl #align fin.cast_eq_cast Fin.cast_eq_cast @[simps! apply] def castAddEmb (m) : Fin n ↪ Fin (n + m) := castLEEmb (le_add_right n m) #align fin.coe_cast_add Fin.coe_castAdd #align fin.cast_add_zero Fin.castAdd_zeroₓ #align fin.cast_add_lt Fin.castAdd_lt #align fin.cast_add_mk Fin.castAdd_mk #align fin.cast_add_cast_lt Fin.castAdd_castLT #align fin.cast_lt_cast_add Fin.castLT_castAdd #align fin.cast_add_cast Fin.castAdd_castₓ #align fin.cast_cast_add_left Fin.cast_castAdd_leftₓ #align fin.cast_cast_add_right Fin.cast_castAdd_rightₓ #align fin.cast_add_cast_add Fin.castAdd_castAdd #align fin.cast_succ_eq Fin.cast_succ_eqₓ #align fin.succ_cast_eq Fin.succ_cast_eqₓ @[simps! apply] def castSuccEmb : Fin n ↪ Fin (n + 1) := castAddEmb _ @[simp, norm_cast] lemma coe_castSuccEmb : (castSuccEmb : Fin n → Fin (n + 1)) = Fin.castSucc := rfl #align fin.coe_cast_succ Fin.coe_castSucc #align fin.cast_succ_mk Fin.castSucc_mk #align fin.cast_cast_succ Fin.cast_castSuccₓ #align fin.cast_succ_lt_succ Fin.castSucc_lt_succ #align fin.le_cast_succ_iff Fin.le_castSucc_iff #align fin.cast_succ_lt_iff_succ_le Fin.castSucc_lt_iff_succ_le #align fin.succ_last Fin.succ_last #align fin.succ_eq_last_succ Fin.succ_eq_last_succ #align fin.cast_succ_cast_lt Fin.castSucc_castLT #align fin.cast_lt_cast_succ Fin.castLT_castSucc #align fin.cast_succ_lt_cast_succ_iff Fin.castSucc_lt_castSucc_iff @[simp] theorem castSucc_le_castSucc_iff {a b : Fin n} : castSucc a ≤ castSucc b ↔ a ≤ b := Iff.rfl @[simp] theorem succ_le_castSucc_iff {a b : Fin n} : succ a ≤ castSucc b ↔ a < b := by rw [le_castSucc_iff, succ_lt_succ_iff] @[simp] theorem castSucc_lt_succ_iff {a b : Fin n} : castSucc a < succ b ↔ a ≤ b := by rw [castSucc_lt_iff_succ_le, succ_le_succ_iff] theorem le_of_castSucc_lt_of_succ_lt {a b : Fin (n + 1)} {i : Fin n} (hl : castSucc i < a) (hu : b < succ i) : b < a := by simp [Fin.lt_def, -val_fin_lt] at *; omega theorem castSucc_lt_or_lt_succ (p : Fin (n + 1)) (i : Fin n) : castSucc i < p ∨ p < i.succ := by simp [Fin.lt_def, -val_fin_lt]; omega #align fin.succ_above_lt_gt Fin.castSucc_lt_or_lt_succ @[deprecated] alias succAbove_lt_gt := castSucc_lt_or_lt_succ	Mathlib/Data/Fin/Basic.lean	928	930	theorem succ_le_or_le_castSucc (p : Fin (n + 1)) (i : Fin n) : succ i ≤ p ∨ p ≤ i.castSucc := by	rw [le_castSucc_iff, ← castSucc_lt_iff_succ_le] exact p.castSucc_lt_or_lt_succ i
import Mathlib.Analysis.SpecialFunctions.Log.Base import Mathlib.MeasureTheory.Measure.MeasureSpaceDef #align_import measure_theory.measure.doubling from "leanprover-community/mathlib"@"5f6e827d81dfbeb6151d7016586ceeb0099b9655" noncomputable section open Set Filter Metric MeasureTheory TopologicalSpace ENNReal NNReal Topology class IsUnifLocDoublingMeasure {α : Type} [MetricSpace α] [MeasurableSpace α] (μ : Measure α) : Prop where exists_measure_closedBall_le_mul'' : ∃ C : ℝ≥0, ∀ᶠ ε in 𝓝[>] 0, ∀ x, μ (closedBall x (2 ε)) ≤ C * μ (closedBall x ε) #align is_unif_loc_doubling_measure IsUnifLocDoublingMeasure namespace IsUnifLocDoublingMeasure variable {α : Type} [MetricSpace α] [MeasurableSpace α] (μ : Measure α) [IsUnifLocDoublingMeasure μ] -- Porting note: added for missing infer kinds theorem exists_measure_closedBall_le_mul : ∃ C : ℝ≥0, ∀ᶠ ε in 𝓝[>] 0, ∀ x, μ (closedBall x (2 ε)) ≤ C * μ (closedBall x ε) := exists_measure_closedBall_le_mul'' def doublingConstant : ℝ≥0 := Classical.choose <\| exists_measure_closedBall_le_mul μ #align is_unif_loc_doubling_measure.doubling_constant IsUnifLocDoublingMeasure.doublingConstant theorem exists_measure_closedBall_le_mul' : ∀ᶠ ε in 𝓝[>] 0, ∀ x, μ (closedBall x (2 * ε)) ≤ doublingConstant μ * μ (closedBall x ε) := Classical.choose_spec <\| exists_measure_closedBall_le_mul μ #align is_unif_loc_doubling_measure.exists_measure_closed_ball_le_mul' IsUnifLocDoublingMeasure.exists_measure_closedBall_le_mul' theorem exists_eventually_forall_measure_closedBall_le_mul (K : ℝ) : ∃ C : ℝ≥0, ∀ᶠ ε in 𝓝[>] 0, ∀ x, ∀ t ≤ K, μ (closedBall x (t * ε)) ≤ C * μ (closedBall x ε) := by let C := doublingConstant μ have hμ : ∀ n : ℕ, ∀ᶠ ε in 𝓝[>] 0, ∀ x, μ (closedBall x ((2 : ℝ) ^ n * ε)) ≤ ↑(C ^ n) * μ (closedBall x ε) := by intro n induction' n with n ih · simp replace ih := eventually_nhdsWithin_pos_mul_left (two_pos : 0 < (2 : ℝ)) ih refine (ih.and (exists_measure_closedBall_le_mul' μ)).mono fun ε hε x => ?_ calc μ (closedBall x ((2 : ℝ) ^ (n + 1) * ε)) = μ (closedBall x ((2 : ℝ) ^ n * (2 * ε))) := by rw [pow_succ, mul_assoc] _ ≤ ↑(C ^ n) * μ (closedBall x (2 * ε)) := hε.1 x _ ≤ ↑(C ^ n) * (C * μ (closedBall x ε)) := by gcongr; exact hε.2 x _ = ↑(C ^ (n + 1)) * μ (closedBall x ε) := by rw [← mul_assoc, pow_succ, ENNReal.coe_mul] rcases lt_or_le K 1 with (hK \| hK) · refine ⟨1, ?_⟩ simp only [ENNReal.coe_one, one_mul] refine eventually_mem_nhdsWithin.mono fun ε hε x t ht ↦ ?_ gcongr nlinarith [mem_Ioi.mp hε] · use C ^ ⌈Real.logb 2 K⌉₊ filter_upwards [hμ ⌈Real.logb 2 K⌉₊, eventually_mem_nhdsWithin] with ε hε hε₀ x t ht refine le_trans ?_ (hε x) gcongr · exact (mem_Ioi.mp hε₀).le · refine ht.trans ?_ rw [← Real.rpow_natCast, ← Real.logb_le_iff_le_rpow] exacts [Nat.le_ceil _, by norm_num, by linarith] #align is_unif_loc_doubling_measure.exists_eventually_forall_measure_closed_ball_le_mul IsUnifLocDoublingMeasure.exists_eventually_forall_measure_closedBall_le_mul def scalingConstantOf (K : ℝ) : ℝ≥0 := max (Classical.choose <\| exists_eventually_forall_measure_closedBall_le_mul μ K) 1 #align is_unif_loc_doubling_measure.scaling_constant_of IsUnifLocDoublingMeasure.scalingConstantOf @[simp] theorem one_le_scalingConstantOf (K : ℝ) : 1 ≤ scalingConstantOf μ K := le_max_of_le_right <\| le_refl 1 #align is_unif_loc_doubling_measure.one_le_scaling_constant_of IsUnifLocDoublingMeasure.one_le_scalingConstantOf	Mathlib/MeasureTheory/Measure/Doubling.lean	113	129	theorem eventually_measure_mul_le_scalingConstantOf_mul (K : ℝ) : ∃ R : ℝ, 0 < R ∧ ∀ x t r, t ∈ Ioc 0 K → r ≤ R → μ (closedBall x (t * r)) ≤ scalingConstantOf μ K * μ (closedBall x r) := by	have h := Classical.choose_spec (exists_eventually_forall_measure_closedBall_le_mul μ K) rcases mem_nhdsWithin_Ioi_iff_exists_Ioc_subset.1 h with ⟨R, Rpos, hR⟩ refine ⟨R, Rpos, fun x t r ht hr => ?_⟩ rcases lt_trichotomy r 0 with (rneg \| rfl \| rpos) · have : t * r < 0 := mul_neg_of_pos_of_neg ht.1 rneg simp only [closedBall_eq_empty.2 this, measure_empty, zero_le'] · simp only [mul_zero, closedBall_zero] refine le_mul_of_one_le_of_le ?_ le_rfl apply ENNReal.one_le_coe_iff.2 (le_max_right _ _) · apply (hR ⟨rpos, hr⟩ x t ht.2).trans gcongr apply le_max_left
import Mathlib.Data.Bool.Basic import Mathlib.Data.Option.Defs import Mathlib.Data.Prod.Basic import Mathlib.Data.Sigma.Basic import Mathlib.Data.Subtype import Mathlib.Data.Sum.Basic import Mathlib.Init.Data.Sigma.Basic import Mathlib.Logic.Equiv.Defs import Mathlib.Logic.Function.Conjugate import Mathlib.Tactic.Lift import Mathlib.Tactic.Convert import Mathlib.Tactic.Contrapose import Mathlib.Tactic.GeneralizeProofs import Mathlib.Tactic.SimpRw #align_import logic.equiv.basic from "leanprover-community/mathlib"@"cd391184c85986113f8c00844cfe6dda1d34be3d" set_option autoImplicit true universe u open Function namespace Equiv @[simps apply symm_apply] def pprodEquivProd : PProd α β ≃ α × β where toFun x := (x.1, x.2) invFun x := ⟨x.1, x.2⟩ left_inv := fun _ => rfl right_inv := fun _ => rfl #align equiv.pprod_equiv_prod Equiv.pprodEquivProd #align equiv.pprod_equiv_prod_apply Equiv.pprodEquivProd_apply #align equiv.pprod_equiv_prod_symm_apply Equiv.pprodEquivProd_symm_apply -- Porting note: in Lean 3 this had `@[congr]` @[simps apply] def pprodCongr (e₁ : α ≃ β) (e₂ : γ ≃ δ) : PProd α γ ≃ PProd β δ where toFun x := ⟨e₁ x.1, e₂ x.2⟩ invFun x := ⟨e₁.symm x.1, e₂.symm x.2⟩ left_inv := fun ⟨x, y⟩ => by simp right_inv := fun ⟨x, y⟩ => by simp #align equiv.pprod_congr Equiv.pprodCongr #align equiv.pprod_congr_apply Equiv.pprodCongr_apply @[simps! apply symm_apply] def pprodProd (ea : α₁ ≃ α₂) (eb : β₁ ≃ β₂) : PProd α₁ β₁ ≃ α₂ × β₂ := (ea.pprodCongr eb).trans pprodEquivProd #align equiv.pprod_prod Equiv.pprodProd #align equiv.pprod_prod_apply Equiv.pprodProd_apply #align equiv.pprod_prod_symm_apply Equiv.pprodProd_symm_apply @[simps! apply symm_apply] def prodPProd (ea : α₁ ≃ α₂) (eb : β₁ ≃ β₂) : α₁ × β₁ ≃ PProd α₂ β₂ := (ea.symm.pprodProd eb.symm).symm #align equiv.prod_pprod Equiv.prodPProd #align equiv.prod_pprod_symm_apply Equiv.prodPProd_symm_apply #align equiv.prod_pprod_apply Equiv.prodPProd_apply @[simps! apply symm_apply] def pprodEquivProdPLift : PProd α β ≃ PLift α × PLift β := Equiv.plift.symm.pprodProd Equiv.plift.symm #align equiv.pprod_equiv_prod_plift Equiv.pprodEquivProdPLift #align equiv.pprod_equiv_prod_plift_symm_apply Equiv.pprodEquivProdPLift_symm_apply #align equiv.pprod_equiv_prod_plift_apply Equiv.pprodEquivProdPLift_apply -- Porting note: in Lean 3 there was also a @[congr] tag @[simps (config := .asFn) apply] def prodCongr (e₁ : α₁ ≃ α₂) (e₂ : β₁ ≃ β₂) : α₁ × β₁ ≃ α₂ × β₂ := ⟨Prod.map e₁ e₂, Prod.map e₁.symm e₂.symm, fun ⟨a, b⟩ => by simp, fun ⟨a, b⟩ => by simp⟩ #align equiv.prod_congr Equiv.prodCongr #align equiv.prod_congr_apply Equiv.prodCongr_apply @[simp] theorem prodCongr_symm (e₁ : α₁ ≃ α₂) (e₂ : β₁ ≃ β₂) : (prodCongr e₁ e₂).symm = prodCongr e₁.symm e₂.symm := rfl #align equiv.prod_congr_symm Equiv.prodCongr_symm def prodComm (α β) : α × β ≃ β × α := ⟨Prod.swap, Prod.swap, Prod.swap_swap, Prod.swap_swap⟩ #align equiv.prod_comm Equiv.prodComm @[simp] theorem coe_prodComm (α β) : (⇑(prodComm α β) : α × β → β × α) = Prod.swap := rfl #align equiv.coe_prod_comm Equiv.coe_prodComm @[simp] theorem prodComm_apply (x : α × β) : prodComm α β x = x.swap := rfl #align equiv.prod_comm_apply Equiv.prodComm_apply @[simp] theorem prodComm_symm (α β) : (prodComm α β).symm = prodComm β α := rfl #align equiv.prod_comm_symm Equiv.prodComm_symm @[simps] def prodAssoc (α β γ) : (α × β) × γ ≃ α × β × γ := ⟨fun p => (p.1.1, p.1.2, p.2), fun p => ((p.1, p.2.1), p.2.2), fun ⟨⟨_, _⟩, _⟩ => rfl, fun ⟨_, ⟨_, _⟩⟩ => rfl⟩ #align equiv.prod_assoc Equiv.prodAssoc #align equiv.prod_assoc_symm_apply Equiv.prodAssoc_symm_apply #align equiv.prod_assoc_apply Equiv.prodAssoc_apply @[simps apply] def prodProdProdComm (α β γ δ : Type) : (α × β) × γ × δ ≃ (α × γ) × β × δ where toFun abcd := ((abcd.1.1, abcd.2.1), (abcd.1.2, abcd.2.2)) invFun acbd := ((acbd.1.1, acbd.2.1), (acbd.1.2, acbd.2.2)) left_inv := fun ⟨⟨_a, _b⟩, ⟨_c, _d⟩⟩ => rfl right_inv := fun ⟨⟨_a, _c⟩, ⟨_b, _d⟩⟩ => rfl #align equiv.prod_prod_prod_comm Equiv.prodProdProdComm @[simp] theorem prodProdProdComm_symm (α β γ δ : Type) : (prodProdProdComm α β γ δ).symm = prodProdProdComm α γ β δ := rfl #align equiv.prod_prod_prod_comm_symm Equiv.prodProdProdComm_symm @[simps (config := .asFn)] def curry (α β γ) : (α × β → γ) ≃ (α → β → γ) where toFun := Function.curry invFun := uncurry left_inv := uncurry_curry right_inv := curry_uncurry #align equiv.curry Equiv.curry #align equiv.curry_symm_apply Equiv.curry_symm_apply #align equiv.curry_apply Equiv.curry_apply section @[simps] def prodPUnit (α) : α × PUnit ≃ α := ⟨fun p => p.1, fun a => (a, PUnit.unit), fun ⟨_, PUnit.unit⟩ => rfl, fun _ => rfl⟩ #align equiv.prod_punit Equiv.prodPUnit #align equiv.prod_punit_apply Equiv.prodPUnit_apply #align equiv.prod_punit_symm_apply Equiv.prodPUnit_symm_apply @[simps!] def punitProd (α) : PUnit × α ≃ α := calc PUnit × α ≃ α × PUnit := prodComm _ _ _ ≃ α := prodPUnit _ #align equiv.punit_prod Equiv.punitProd #align equiv.punit_prod_symm_apply Equiv.punitProd_symm_apply #align equiv.punit_prod_apply Equiv.punitProd_apply @[simps] def sigmaPUnit (α) : (_ : α) × PUnit ≃ α := ⟨fun p => p.1, fun a => ⟨a, PUnit.unit⟩, fun ⟨_, PUnit.unit⟩ => rfl, fun _ => rfl⟩ def prodUnique (α β) [Unique β] : α × β ≃ α := ((Equiv.refl α).prodCongr <\| equivPUnit.{_,1} β).trans <\| prodPUnit α #align equiv.prod_unique Equiv.prodUnique @[simp] theorem coe_prodUnique [Unique β] : (⇑(prodUnique α β) : α × β → α) = Prod.fst := rfl #align equiv.coe_prod_unique Equiv.coe_prodUnique theorem prodUnique_apply [Unique β] (x : α × β) : prodUnique α β x = x.1 := rfl #align equiv.prod_unique_apply Equiv.prodUnique_apply @[simp] theorem prodUnique_symm_apply [Unique β] (x : α) : (prodUnique α β).symm x = (x, default) := rfl #align equiv.prod_unique_symm_apply Equiv.prodUnique_symm_apply def uniqueProd (α β) [Unique β] : β × α ≃ α := ((equivPUnit.{_,1} β).prodCongr <\| Equiv.refl α).trans <\| punitProd α #align equiv.unique_prod Equiv.uniqueProd @[simp] theorem coe_uniqueProd [Unique β] : (⇑(uniqueProd α β) : β × α → α) = Prod.snd := rfl #align equiv.coe_unique_prod Equiv.coe_uniqueProd theorem uniqueProd_apply [Unique β] (x : β × α) : uniqueProd α β x = x.2 := rfl #align equiv.unique_prod_apply Equiv.uniqueProd_apply @[simp] theorem uniqueProd_symm_apply [Unique β] (x : α) : (uniqueProd α β).symm x = (default, x) := rfl #align equiv.unique_prod_symm_apply Equiv.uniqueProd_symm_apply def sigmaUnique (α) (β : α → Type) [∀ a, Unique (β a)] : (a : α) × (β a) ≃ α := (Equiv.sigmaCongrRight fun a ↦ equivPUnit.{_,1} (β a)).trans <\| sigmaPUnit α @[simp] theorem coe_sigmaUnique {β : α → Type} [∀ a, Unique (β a)] : (⇑(sigmaUnique α β) : (a : α) × (β a) → α) = Sigma.fst := rfl theorem sigmaUnique_apply {β : α → Type} [∀ a, Unique (β a)] (x : (a : α) × β a) : sigmaUnique α β x = x.1 := rfl @[simp] theorem sigmaUnique_symm_apply {β : α → Type} [∀ a, Unique (β a)] (x : α) : (sigmaUnique α β).symm x = ⟨x, default⟩ := rfl def prodEmpty (α) : α × Empty ≃ Empty := equivEmpty _ #align equiv.prod_empty Equiv.prodEmpty def emptyProd (α) : Empty × α ≃ Empty := equivEmpty _ #align equiv.empty_prod Equiv.emptyProd def prodPEmpty (α) : α × PEmpty ≃ PEmpty := equivPEmpty _ #align equiv.prod_pempty Equiv.prodPEmpty def pemptyProd (α) : PEmpty × α ≃ PEmpty := equivPEmpty _ #align equiv.pempty_prod Equiv.pemptyProd end section open Sum def psumEquivSum (α β) : PSum α β ≃ Sum α β where toFun s := PSum.casesOn s inl inr invFun := Sum.elim PSum.inl PSum.inr left_inv s := by cases s <;> rfl right_inv s := by cases s <;> rfl #align equiv.psum_equiv_sum Equiv.psumEquivSum @[simps apply] def sumCongr (ea : α₁ ≃ α₂) (eb : β₁ ≃ β₂) : Sum α₁ β₁ ≃ Sum α₂ β₂ := ⟨Sum.map ea eb, Sum.map ea.symm eb.symm, fun x => by simp, fun x => by simp⟩ #align equiv.sum_congr Equiv.sumCongr #align equiv.sum_congr_apply Equiv.sumCongr_apply def psumCongr (e₁ : α ≃ β) (e₂ : γ ≃ δ) : PSum α γ ≃ PSum β δ where toFun x := PSum.casesOn x (PSum.inl ∘ e₁) (PSum.inr ∘ e₂) invFun x := PSum.casesOn x (PSum.inl ∘ e₁.symm) (PSum.inr ∘ e₂.symm) left_inv := by rintro (x \| x) <;> simp right_inv := by rintro (x \| x) <;> simp #align equiv.psum_congr Equiv.psumCongr def psumSum (ea : α₁ ≃ α₂) (eb : β₁ ≃ β₂) : PSum α₁ β₁ ≃ Sum α₂ β₂ := (ea.psumCongr eb).trans (psumEquivSum _ _) #align equiv.psum_sum Equiv.psumSum def sumPSum (ea : α₁ ≃ α₂) (eb : β₁ ≃ β₂) : Sum α₁ β₁ ≃ PSum α₂ β₂ := (ea.symm.psumSum eb.symm).symm #align equiv.sum_psum Equiv.sumPSum @[simp] theorem sumCongr_trans (e : α₁ ≃ β₁) (f : α₂ ≃ β₂) (g : β₁ ≃ γ₁) (h : β₂ ≃ γ₂) : (Equiv.sumCongr e f).trans (Equiv.sumCongr g h) = Equiv.sumCongr (e.trans g) (f.trans h) := by ext i cases i <;> rfl #align equiv.sum_congr_trans Equiv.sumCongr_trans @[simp] theorem sumCongr_symm (e : α ≃ β) (f : γ ≃ δ) : (Equiv.sumCongr e f).symm = Equiv.sumCongr e.symm f.symm := rfl #align equiv.sum_congr_symm Equiv.sumCongr_symm @[simp] theorem sumCongr_refl : Equiv.sumCongr (Equiv.refl α) (Equiv.refl β) = Equiv.refl (Sum α β) := by ext i cases i <;> rfl #align equiv.sum_congr_refl Equiv.sumCongr_refl def subtypeSum {p : α ⊕ β → Prop} : {c // p c} ≃ {a // p (Sum.inl a)} ⊕ {b // p (Sum.inr b)} where toFun c := match h : c.1 with \| Sum.inl a => Sum.inl ⟨a, h ▸ c.2⟩ \| Sum.inr b => Sum.inr ⟨b, h ▸ c.2⟩ invFun c := match c with \| Sum.inl a => ⟨Sum.inl a, a.2⟩ \| Sum.inr b => ⟨Sum.inr b, b.2⟩ left_inv := by rintro ⟨a \| b, h⟩ <;> rfl right_inv := by rintro (a \| b) <;> rfl def boolEquivPUnitSumPUnit : Bool ≃ Sum PUnit.{u + 1} PUnit.{v + 1} := ⟨fun b => b.casesOn (inl PUnit.unit) (inr PUnit.unit) , Sum.elim (fun _ => false) fun _ => true, fun b => by cases b <;> rfl, fun s => by rcases s with (⟨⟨⟩⟩ \| ⟨⟨⟩⟩) <;> rfl⟩ #align equiv.bool_equiv_punit_sum_punit Equiv.boolEquivPUnitSumPUnit @[simps (config := .asFn) apply] def sumComm (α β) : Sum α β ≃ Sum β α := ⟨Sum.swap, Sum.swap, Sum.swap_swap, Sum.swap_swap⟩ #align equiv.sum_comm Equiv.sumComm #align equiv.sum_comm_apply Equiv.sumComm_apply @[simp] theorem sumComm_symm (α β) : (sumComm α β).symm = sumComm β α := rfl #align equiv.sum_comm_symm Equiv.sumComm_symm def sumAssoc (α β γ) : Sum (Sum α β) γ ≃ Sum α (Sum β γ) := ⟨Sum.elim (Sum.elim Sum.inl (Sum.inr ∘ Sum.inl)) (Sum.inr ∘ Sum.inr), Sum.elim (Sum.inl ∘ Sum.inl) <\| Sum.elim (Sum.inl ∘ Sum.inr) Sum.inr, by rintro (⟨_ \| _⟩ \| _) <;> rfl, by rintro (_ \| ⟨_ \| _⟩) <;> rfl⟩ #align equiv.sum_assoc Equiv.sumAssoc @[simp] theorem sumAssoc_apply_inl_inl (a) : sumAssoc α β γ (inl (inl a)) = inl a := rfl #align equiv.sum_assoc_apply_inl_inl Equiv.sumAssoc_apply_inl_inl @[simp] theorem sumAssoc_apply_inl_inr (b) : sumAssoc α β γ (inl (inr b)) = inr (inl b) := rfl #align equiv.sum_assoc_apply_inl_inr Equiv.sumAssoc_apply_inl_inr @[simp] theorem sumAssoc_apply_inr (c) : sumAssoc α β γ (inr c) = inr (inr c) := rfl #align equiv.sum_assoc_apply_inr Equiv.sumAssoc_apply_inr @[simp] theorem sumAssoc_symm_apply_inl {α β γ} (a) : (sumAssoc α β γ).symm (inl a) = inl (inl a) := rfl #align equiv.sum_assoc_symm_apply_inl Equiv.sumAssoc_symm_apply_inl @[simp] theorem sumAssoc_symm_apply_inr_inl {α β γ} (b) : (sumAssoc α β γ).symm (inr (inl b)) = inl (inr b) := rfl #align equiv.sum_assoc_symm_apply_inr_inl Equiv.sumAssoc_symm_apply_inr_inl @[simp] theorem sumAssoc_symm_apply_inr_inr {α β γ} (c) : (sumAssoc α β γ).symm (inr (inr c)) = inr c := rfl #align equiv.sum_assoc_symm_apply_inr_inr Equiv.sumAssoc_symm_apply_inr_inr @[simps symm_apply] def sumEmpty (α β) [IsEmpty β] : Sum α β ≃ α where toFun := Sum.elim id isEmptyElim invFun := inl left_inv s := by rcases s with (_ \| x) · rfl · exact isEmptyElim x right_inv _ := rfl #align equiv.sum_empty Equiv.sumEmpty #align equiv.sum_empty_symm_apply Equiv.sumEmpty_symm_apply @[simp] theorem sumEmpty_apply_inl [IsEmpty β] (a : α) : sumEmpty α β (Sum.inl a) = a := rfl #align equiv.sum_empty_apply_inl Equiv.sumEmpty_apply_inl @[simps! symm_apply] def emptySum (α β) [IsEmpty α] : Sum α β ≃ β := (sumComm _ _).trans <\| sumEmpty _ _ #align equiv.empty_sum Equiv.emptySum #align equiv.empty_sum_symm_apply Equiv.emptySum_symm_apply @[simp] theorem emptySum_apply_inr [IsEmpty α] (b : β) : emptySum α β (Sum.inr b) = b := rfl #align equiv.empty_sum_apply_inr Equiv.emptySum_apply_inr def optionEquivSumPUnit (α) : Option α ≃ Sum α PUnit := ⟨fun o => o.elim (inr PUnit.unit) inl, fun s => s.elim some fun _ => none, fun o => by cases o <;> rfl, fun s => by rcases s with (_ \| ⟨⟨⟩⟩) <;> rfl⟩ #align equiv.option_equiv_sum_punit Equiv.optionEquivSumPUnit @[simp] theorem optionEquivSumPUnit_none : optionEquivSumPUnit α none = Sum.inr PUnit.unit := rfl #align equiv.option_equiv_sum_punit_none Equiv.optionEquivSumPUnit_none @[simp] theorem optionEquivSumPUnit_some (a) : optionEquivSumPUnit α (some a) = Sum.inl a := rfl #align equiv.option_equiv_sum_punit_some Equiv.optionEquivSumPUnit_some @[simp] theorem optionEquivSumPUnit_coe (a : α) : optionEquivSumPUnit α a = Sum.inl a := rfl #align equiv.option_equiv_sum_punit_coe Equiv.optionEquivSumPUnit_coe @[simp] theorem optionEquivSumPUnit_symm_inl (a) : (optionEquivSumPUnit α).symm (Sum.inl a) = a := rfl #align equiv.option_equiv_sum_punit_symm_inl Equiv.optionEquivSumPUnit_symm_inl @[simp] theorem optionEquivSumPUnit_symm_inr (a) : (optionEquivSumPUnit α).symm (Sum.inr a) = none := rfl #align equiv.option_equiv_sum_punit_symm_inr Equiv.optionEquivSumPUnit_symm_inr @[simps] def optionIsSomeEquiv (α) : { x : Option α // x.isSome } ≃ α where toFun o := Option.get _ o.2 invFun x := ⟨some x, rfl⟩ left_inv _ := Subtype.eq <\| Option.some_get _ right_inv _ := Option.get_some _ _ #align equiv.option_is_some_equiv Equiv.optionIsSomeEquiv #align equiv.option_is_some_equiv_apply Equiv.optionIsSomeEquiv_apply #align equiv.option_is_some_equiv_symm_apply_coe Equiv.optionIsSomeEquiv_symm_apply_coe @[simps] def piOptionEquivProd {β : Option α → Type} : (∀ a : Option α, β a) ≃ β none × ∀ a : α, β (some a) where toFun f := (f none, fun a => f (some a)) invFun x a := Option.casesOn a x.fst x.snd left_inv f := funext fun a => by cases a <;> rfl right_inv x := by simp #align equiv.pi_option_equiv_prod Equiv.piOptionEquivProd #align equiv.pi_option_equiv_prod_symm_apply Equiv.piOptionEquivProd_symm_apply #align equiv.pi_option_equiv_prod_apply Equiv.piOptionEquivProd_apply def sumEquivSigmaBool (α β : Type u) : Sum α β ≃ Σ b : Bool, b.casesOn α β := ⟨fun s => s.elim (fun x => ⟨false, x⟩) fun x => ⟨true, x⟩, fun s => match s with \| ⟨false, a⟩ => inl a \| ⟨true, b⟩ => inr b, fun s => by cases s <;> rfl, fun s => by rcases s with ⟨_ \| _, _⟩ <;> rfl⟩ #align equiv.sum_equiv_sigma_bool Equiv.sumEquivSigmaBool -- See also `Equiv.sigmaPreimageEquiv`. @[simps] def sigmaFiberEquiv {α β : Type} (f : α → β) : (Σ y : β, { x // f x = y }) ≃ α := ⟨fun x => ↑x.2, fun x => ⟨f x, x, rfl⟩, fun ⟨_, _, rfl⟩ => rfl, fun _ => rfl⟩ #align equiv.sigma_fiber_equiv Equiv.sigmaFiberEquiv #align equiv.sigma_fiber_equiv_apply Equiv.sigmaFiberEquiv_apply #align equiv.sigma_fiber_equiv_symm_apply_fst Equiv.sigmaFiberEquiv_symm_apply_fst #align equiv.sigma_fiber_equiv_symm_apply_snd_coe Equiv.sigmaFiberEquiv_symm_apply_snd_coe def sigmaEquivOptionOfInhabited (α : Type u) [Inhabited α] [DecidableEq α] : Σ β : Type u, α ≃ Option β where fst := {a // a ≠ default} snd.toFun a := if h : a = default then none else some ⟨a, h⟩ snd.invFun := Option.elim' default (↑) snd.left_inv a := by dsimp only; split_ifs <;> simp [] snd.right_inv \| none => by simp \| some ⟨a, ha⟩ => dif_neg ha #align equiv.sigma_equiv_option_of_inhabited Equiv.sigmaEquivOptionOfInhabited end section def piCongrRight {β₁ β₂ : α → Sort} (F : ∀ a, β₁ a ≃ β₂ a) : (∀ a, β₁ a) ≃ (∀ a, β₂ a) := ⟨fun H a => F a (H a), fun H a => (F a).symm (H a), fun H => funext <\| by simp, fun H => funext <\| by simp⟩ #align equiv.Pi_congr_right Equiv.piCongrRight @[simps apply] def piComm (φ : α → β → Sort) : (∀ a b, φ a b) ≃ ∀ b a, φ a b := ⟨swap, swap, fun _ => rfl, fun _ => rfl⟩ #align equiv.Pi_comm Equiv.piComm #align equiv.Pi_comm_apply Equiv.piComm_apply @[simp] theorem piComm_symm {φ : α → β → Sort} : (piComm φ).symm = (piComm <\| swap φ) := rfl #align equiv.Pi_comm_symm Equiv.piComm_symm def piCurry {β : α → Type} (γ : ∀ a, β a → Type) : (∀ x : Σ i, β i, γ x.1 x.2) ≃ ∀ a b, γ a b where toFun := Sigma.curry invFun := Sigma.uncurry left_inv := Sigma.uncurry_curry right_inv := Sigma.curry_uncurry #align equiv.Pi_curry Equiv.piCurry -- `simps` overapplies these but `simps (config := .asFn)` under-applies them @[simp] theorem piCurry_apply {β : α → Type} (γ : ∀ a, β a → Type) (f : ∀ x : Σ i, β i, γ x.1 x.2) : piCurry γ f = Sigma.curry f := rfl @[simp] theorem piCurry_symm_apply {β : α → Type} (γ : ∀ a, β a → Type) (f : ∀ a b, γ a b) : (piCurry γ).symm f = Sigma.uncurry f := rfl end section def arrowProdEquivProdArrow (α β γ : Type) : (γ → α × β) ≃ (γ → α) × (γ → β) where toFun := fun f => (fun c => (f c).1, fun c => (f c).2) invFun := fun p c => (p.1 c, p.2 c) left_inv := fun f => rfl right_inv := fun p => by cases p; rfl #align equiv.arrow_prod_equiv_prod_arrow Equiv.arrowProdEquivProdArrow open Sum @[simps] def sumPiEquivProdPi (π : ι ⊕ ι' → Type) : (∀ i, π i) ≃ (∀ i, π (inl i)) × ∀ i', π (inr i') where toFun f := ⟨fun i => f (inl i), fun i' => f (inr i')⟩ invFun g := Sum.rec g.1 g.2 left_inv f := by ext (i \| i) <;> rfl right_inv g := Prod.ext rfl rfl @[simps!] def prodPiEquivSumPi (π : ι → Type u) (π' : ι' → Type u) : ((∀ i, π i) × ∀ i', π' i') ≃ ∀ i, Sum.elim π π' i := sumPiEquivProdPi (Sum.elim π π') \|>.symm def sumArrowEquivProdArrow (α β γ : Type) : (Sum α β → γ) ≃ (α → γ) × (β → γ) := ⟨fun f => (f ∘ inl, f ∘ inr), fun p => Sum.elim p.1 p.2, fun f => by ext ⟨⟩ <;> rfl, fun p => by cases p rfl⟩ #align equiv.sum_arrow_equiv_prod_arrow Equiv.sumArrowEquivProdArrow @[simp] theorem sumArrowEquivProdArrow_apply_fst (f : Sum α β → γ) (a : α) : (sumArrowEquivProdArrow α β γ f).1 a = f (inl a) := rfl #align equiv.sum_arrow_equiv_prod_arrow_apply_fst Equiv.sumArrowEquivProdArrow_apply_fst @[simp] theorem sumArrowEquivProdArrow_apply_snd (f : Sum α β → γ) (b : β) : (sumArrowEquivProdArrow α β γ f).2 b = f (inr b) := rfl #align equiv.sum_arrow_equiv_prod_arrow_apply_snd Equiv.sumArrowEquivProdArrow_apply_snd @[simp] theorem sumArrowEquivProdArrow_symm_apply_inl (f : α → γ) (g : β → γ) (a : α) : ((sumArrowEquivProdArrow α β γ).symm (f, g)) (inl a) = f a := rfl #align equiv.sum_arrow_equiv_prod_arrow_symm_apply_inl Equiv.sumArrowEquivProdArrow_symm_apply_inl @[simp] theorem sumArrowEquivProdArrow_symm_apply_inr (f : α → γ) (g : β → γ) (b : β) : ((sumArrowEquivProdArrow α β γ).symm (f, g)) (inr b) = g b := rfl #align equiv.sum_arrow_equiv_prod_arrow_symm_apply_inr Equiv.sumArrowEquivProdArrow_symm_apply_inr def sumProdDistrib (α β γ) : Sum α β × γ ≃ Sum (α × γ) (β × γ) := ⟨fun p => p.1.map (fun x => (x, p.2)) fun x => (x, p.2), fun s => s.elim (Prod.map inl id) (Prod.map inr id), by rintro ⟨_ \| _, _⟩ <;> rfl, by rintro (⟨_, _⟩ \| ⟨_, _⟩) <;> rfl⟩ #align equiv.sum_prod_distrib Equiv.sumProdDistrib @[simp] theorem sumProdDistrib_apply_left (a : α) (c : γ) : sumProdDistrib α β γ (Sum.inl a, c) = Sum.inl (a, c) := rfl #align equiv.sum_prod_distrib_apply_left Equiv.sumProdDistrib_apply_left @[simp] theorem sumProdDistrib_apply_right (b : β) (c : γ) : sumProdDistrib α β γ (Sum.inr b, c) = Sum.inr (b, c) := rfl #align equiv.sum_prod_distrib_apply_right Equiv.sumProdDistrib_apply_right @[simp] theorem sumProdDistrib_symm_apply_left (a : α × γ) : (sumProdDistrib α β γ).symm (inl a) = (inl a.1, a.2) := rfl #align equiv.sum_prod_distrib_symm_apply_left Equiv.sumProdDistrib_symm_apply_left @[simp] theorem sumProdDistrib_symm_apply_right (b : β × γ) : (sumProdDistrib α β γ).symm (inr b) = (inr b.1, b.2) := rfl #align equiv.sum_prod_distrib_symm_apply_right Equiv.sumProdDistrib_symm_apply_right def prodSumDistrib (α β γ) : α × Sum β γ ≃ Sum (α × β) (α × γ) := calc α × Sum β γ ≃ Sum β γ × α := prodComm _ _ _ ≃ Sum (β × α) (γ × α) := sumProdDistrib _ _ _ _ ≃ Sum (α × β) (α × γ) := sumCongr (prodComm _ _) (prodComm _ _) #align equiv.prod_sum_distrib Equiv.prodSumDistrib @[simp] theorem prodSumDistrib_apply_left (a : α) (b : β) : prodSumDistrib α β γ (a, Sum.inl b) = Sum.inl (a, b) := rfl #align equiv.prod_sum_distrib_apply_left Equiv.prodSumDistrib_apply_left @[simp] theorem prodSumDistrib_apply_right (a : α) (c : γ) : prodSumDistrib α β γ (a, Sum.inr c) = Sum.inr (a, c) := rfl #align equiv.prod_sum_distrib_apply_right Equiv.prodSumDistrib_apply_right @[simp] theorem prodSumDistrib_symm_apply_left (a : α × β) : (prodSumDistrib α β γ).symm (inl a) = (a.1, inl a.2) := rfl #align equiv.prod_sum_distrib_symm_apply_left Equiv.prodSumDistrib_symm_apply_left @[simp] theorem prodSumDistrib_symm_apply_right (a : α × γ) : (prodSumDistrib α β γ).symm (inr a) = (a.1, inr a.2) := rfl #align equiv.prod_sum_distrib_symm_apply_right Equiv.prodSumDistrib_symm_apply_right @[simps] def sigmaSumDistrib (α β : ι → Type) : (Σ i, Sum (α i) (β i)) ≃ Sum (Σ i, α i) (Σ i, β i) := ⟨fun p => p.2.map (Sigma.mk p.1) (Sigma.mk p.1), Sum.elim (Sigma.map id fun _ => Sum.inl) (Sigma.map id fun _ => Sum.inr), fun p => by rcases p with ⟨i, a \| b⟩ <;> rfl, fun p => by rcases p with (⟨i, a⟩ \| ⟨i, b⟩) <;> rfl⟩ #align equiv.sigma_sum_distrib Equiv.sigmaSumDistrib #align equiv.sigma_sum_distrib_apply Equiv.sigmaSumDistrib_apply #align equiv.sigma_sum_distrib_symm_apply Equiv.sigmaSumDistrib_symm_apply def sigmaProdDistrib (α : ι → Type) (β : Type) : (Σ i, α i) × β ≃ Σ i, α i × β := ⟨fun p => ⟨p.1.1, (p.1.2, p.2)⟩, fun p => (⟨p.1, p.2.1⟩, p.2.2), fun p => by rcases p with ⟨⟨_, _⟩, _⟩ rfl, fun p => by rcases p with ⟨_, ⟨_, _⟩⟩ rfl⟩ #align equiv.sigma_prod_distrib Equiv.sigmaProdDistrib def sigmaNatSucc (f : ℕ → Type u) : (Σ n, f n) ≃ Sum (f 0) (Σ n, f (n + 1)) := ⟨fun x => @Sigma.casesOn ℕ f (fun _ => Sum (f 0) (Σn, f (n + 1))) x fun n => @Nat.casesOn (fun i => f i → Sum (f 0) (Σn : ℕ, f (n + 1))) n (fun x : f 0 => Sum.inl x) fun (n : ℕ) (x : f n.succ) => Sum.inr ⟨n, x⟩, Sum.elim (Sigma.mk 0) (Sigma.map Nat.succ fun _ => id), by rintro ⟨n \| n, x⟩ <;> rfl, by rintro (x \| ⟨n, x⟩) <;> rfl⟩ #align equiv.sigma_nat_succ Equiv.sigmaNatSucc @[simps] def boolProdEquivSum (α) : Bool × α ≃ Sum α α where toFun p := p.1.casesOn (inl p.2) (inr p.2) invFun := Sum.elim (Prod.mk false) (Prod.mk true) left_inv := by rintro ⟨_ \| _, _⟩ <;> rfl right_inv := by rintro (_ \| _) <;> rfl #align equiv.bool_prod_equiv_sum Equiv.boolProdEquivSum #align equiv.bool_prod_equiv_sum_apply Equiv.boolProdEquivSum_apply #align equiv.bool_prod_equiv_sum_symm_apply Equiv.boolProdEquivSum_symm_apply @[simps] def boolArrowEquivProd (α) : (Bool → α) ≃ α × α where toFun f := (f false, f true) invFun p b := b.casesOn p.1 p.2 left_inv _ := funext <\| Bool.forall_bool.2 ⟨rfl, rfl⟩ right_inv := fun _ => rfl #align equiv.bool_arrow_equiv_prod Equiv.boolArrowEquivProd #align equiv.bool_arrow_equiv_prod_apply Equiv.boolArrowEquivProd_apply #align equiv.bool_arrow_equiv_prod_symm_apply Equiv.boolArrowEquivProd_symm_apply end section open Sum Nat def natEquivNatSumPUnit : ℕ ≃ Sum ℕ PUnit where toFun n := Nat.casesOn n (inr PUnit.unit) inl invFun := Sum.elim Nat.succ fun _ => 0 left_inv n := by cases n <;> rfl right_inv := by rintro (_ \| _) <;> rfl #align equiv.nat_equiv_nat_sum_punit Equiv.natEquivNatSumPUnit def natSumPUnitEquivNat : Sum ℕ PUnit ≃ ℕ := natEquivNatSumPUnit.symm #align equiv.nat_sum_punit_equiv_nat Equiv.natSumPUnitEquivNat def intEquivNatSumNat : ℤ ≃ Sum ℕ ℕ where toFun z := Int.casesOn z inl inr invFun := Sum.elim Int.ofNat Int.negSucc left_inv := by rintro (m \| n) <;> rfl right_inv := by rintro (m \| n) <;> rfl #align equiv.int_equiv_nat_sum_nat Equiv.intEquivNatSumNat end def listEquivOfEquiv (e : α ≃ β) : List α ≃ List β where toFun := List.map e invFun := List.map e.symm left_inv l := by rw [List.map_map, e.symm_comp_self, List.map_id] right_inv l := by rw [List.map_map, e.self_comp_symm, List.map_id] #align equiv.list_equiv_of_equiv Equiv.listEquivOfEquiv def uniqueCongr (e : α ≃ β) : Unique α ≃ Unique β where toFun h := @Equiv.unique _ _ h e.symm invFun h := @Equiv.unique _ _ h e left_inv _ := Subsingleton.elim _ _ right_inv _ := Subsingleton.elim _ _ #align equiv.unique_congr Equiv.uniqueCongr theorem isEmpty_congr (e : α ≃ β) : IsEmpty α ↔ IsEmpty β := ⟨fun h => @Function.isEmpty _ _ h e.symm, fun h => @Function.isEmpty _ _ h e⟩ #align equiv.is_empty_congr Equiv.isEmpty_congr protected theorem isEmpty (e : α ≃ β) [IsEmpty β] : IsEmpty α := e.isEmpty_congr.mpr ‹_› #align equiv.is_empty Equiv.isEmpty section open Subtype def subtypeEquiv {p : α → Prop} {q : β → Prop} (e : α ≃ β) (h : ∀ a, p a ↔ q (e a)) : { a : α // p a } ≃ { b : β // q b } where toFun a := ⟨e a, (h _).mp a.property⟩ invFun b := ⟨e.symm b, (h _).mpr ((e.apply_symm_apply b).symm ▸ b.property)⟩ left_inv a := Subtype.ext <\| by simp right_inv b := Subtype.ext <\| by simp #align equiv.subtype_equiv Equiv.subtypeEquiv lemma coe_subtypeEquiv_eq_map {X Y : Type} {p : X → Prop} {q : Y → Prop} (e : X ≃ Y) (h : ∀ x, p x ↔ q (e x)) : ⇑(e.subtypeEquiv h) = Subtype.map e (h · \|>.mp) := rfl @[simp] theorem subtypeEquiv_refl {p : α → Prop} (h : ∀ a, p a ↔ p (Equiv.refl _ a) := fun a => Iff.rfl) : (Equiv.refl α).subtypeEquiv h = Equiv.refl { a : α // p a } := by ext rfl #align equiv.subtype_equiv_refl Equiv.subtypeEquiv_refl @[simp] theorem subtypeEquiv_symm {p : α → Prop} {q : β → Prop} (e : α ≃ β) (h : ∀ a : α, p a ↔ q (e a)) : (e.subtypeEquiv h).symm = e.symm.subtypeEquiv fun a => by convert (h <\| e.symm a).symm exact (e.apply_symm_apply a).symm := rfl #align equiv.subtype_equiv_symm Equiv.subtypeEquiv_symm @[simp] theorem subtypeEquiv_trans {p : α → Prop} {q : β → Prop} {r : γ → Prop} (e : α ≃ β) (f : β ≃ γ) (h : ∀ a : α, p a ↔ q (e a)) (h' : ∀ b : β, q b ↔ r (f b)) : (e.subtypeEquiv h).trans (f.subtypeEquiv h') = (e.trans f).subtypeEquiv fun a => (h a).trans (h' <\| e a) := rfl #align equiv.subtype_equiv_trans Equiv.subtypeEquiv_trans @[simp] theorem subtypeEquiv_apply {p : α → Prop} {q : β → Prop} (e : α ≃ β) (h : ∀ a : α, p a ↔ q (e a)) (x : { x // p x }) : e.subtypeEquiv h x = ⟨e x, (h _).1 x.2⟩ := rfl #align equiv.subtype_equiv_apply Equiv.subtypeEquiv_apply @[simps!] def subtypeEquivRight {p q : α → Prop} (e : ∀ x, p x ↔ q x) : { x // p x } ≃ { x // q x } := subtypeEquiv (Equiv.refl _) e #align equiv.subtype_equiv_right Equiv.subtypeEquivRight #align equiv.subtype_equiv_right_apply_coe Equiv.subtypeEquivRight_apply_coe #align equiv.subtype_equiv_right_symm_apply_coe Equiv.subtypeEquivRight_symm_apply_coe lemma subtypeEquivRight_apply {p q : α → Prop} (e : ∀ x, p x ↔ q x) (z : { x // p x }) : subtypeEquivRight e z = ⟨z, (e z.1).mp z.2⟩ := rfl lemma subtypeEquivRight_symm_apply {p q : α → Prop} (e : ∀ x, p x ↔ q x) (z : { x // q x }) : (subtypeEquivRight e).symm z = ⟨z, (e z.1).mpr z.2⟩ := rfl def subtypeEquivOfSubtype {p : β → Prop} (e : α ≃ β) : { a : α // p (e a) } ≃ { b : β // p b } := subtypeEquiv e <\| by simp #align equiv.subtype_equiv_of_subtype Equiv.subtypeEquivOfSubtype def subtypeEquivOfSubtype' {p : α → Prop} (e : α ≃ β) : { a : α // p a } ≃ { b : β // p (e.symm b) } := e.symm.subtypeEquivOfSubtype.symm #align equiv.subtype_equiv_of_subtype' Equiv.subtypeEquivOfSubtype' def subtypeEquivProp {p q : α → Prop} (h : p = q) : Subtype p ≃ Subtype q := subtypeEquiv (Equiv.refl α) fun _ => h ▸ Iff.rfl #align equiv.subtype_equiv_prop Equiv.subtypeEquivProp @[simps] def subtypeSubtypeEquivSubtypeExists (p : α → Prop) (q : Subtype p → Prop) : Subtype q ≃ { a : α // ∃ h : p a, q ⟨a, h⟩ } := ⟨fun a => ⟨a.1, a.1.2, by rcases a with ⟨⟨a, hap⟩, haq⟩ exact haq⟩, fun a => ⟨⟨a, a.2.fst⟩, a.2.snd⟩, fun ⟨⟨a, ha⟩, h⟩ => rfl, fun ⟨a, h₁, h₂⟩ => rfl⟩ #align equiv.subtype_subtype_equiv_subtype_exists Equiv.subtypeSubtypeEquivSubtypeExists #align equiv.subtype_subtype_equiv_subtype_exists_symm_apply_coe_coe Equiv.subtypeSubtypeEquivSubtypeExists_symm_apply_coe_coe #align equiv.subtype_subtype_equiv_subtype_exists_apply_coe Equiv.subtypeSubtypeEquivSubtypeExists_apply_coe @[simps!] def subtypeSubtypeEquivSubtypeInter {α : Type u} (p q : α → Prop) : { x : Subtype p // q x.1 } ≃ Subtype fun x => p x ∧ q x := (subtypeSubtypeEquivSubtypeExists p _).trans <\| subtypeEquivRight fun x => @exists_prop (q x) (p x) #align equiv.subtype_subtype_equiv_subtype_inter Equiv.subtypeSubtypeEquivSubtypeInter #align equiv.subtype_subtype_equiv_subtype_inter_apply_coe Equiv.subtypeSubtypeEquivSubtypeInter_apply_coe #align equiv.subtype_subtype_equiv_subtype_inter_symm_apply_coe_coe Equiv.subtypeSubtypeEquivSubtypeInter_symm_apply_coe_coe @[simps!] def subtypeSubtypeEquivSubtype {p q : α → Prop} (h : ∀ {x}, q x → p x) : { x : Subtype p // q x.1 } ≃ Subtype q := (subtypeSubtypeEquivSubtypeInter p _).trans <\| subtypeEquivRight fun _ => and_iff_right_of_imp h #align equiv.subtype_subtype_equiv_subtype Equiv.subtypeSubtypeEquivSubtype #align equiv.subtype_subtype_equiv_subtype_apply_coe Equiv.subtypeSubtypeEquivSubtype_apply_coe #align equiv.subtype_subtype_equiv_subtype_symm_apply_coe_coe Equiv.subtypeSubtypeEquivSubtype_symm_apply_coe_coe @[simps apply symm_apply] def subtypeUnivEquiv {p : α → Prop} (h : ∀ x, p x) : Subtype p ≃ α := ⟨fun x => x, fun x => ⟨x, h x⟩, fun _ => Subtype.eq rfl, fun _ => rfl⟩ #align equiv.subtype_univ_equiv Equiv.subtypeUnivEquiv #align equiv.subtype_univ_equiv_apply Equiv.subtypeUnivEquiv_apply #align equiv.subtype_univ_equiv_symm_apply Equiv.subtypeUnivEquiv_symm_apply def subtypeSigmaEquiv (p : α → Type v) (q : α → Prop) : { y : Sigma p // q y.1 } ≃ Σ x : Subtype q, p x.1 := ⟨fun x => ⟨⟨x.1.1, x.2⟩, x.1.2⟩, fun x => ⟨⟨x.1.1, x.2⟩, x.1.2⟩, fun _ => rfl, fun _ => rfl⟩ #align equiv.subtype_sigma_equiv Equiv.subtypeSigmaEquiv def sigmaSubtypeEquivOfSubset (p : α → Type v) (q : α → Prop) (h : ∀ x, p x → q x) : (Σ x : Subtype q, p x) ≃ Σ x : α, p x := (subtypeSigmaEquiv p q).symm.trans <\| subtypeUnivEquiv fun x => h x.1 x.2 #align equiv.sigma_subtype_equiv_of_subset Equiv.sigmaSubtypeEquivOfSubset def sigmaSubtypeFiberEquiv {α β : Type} (f : α → β) (p : β → Prop) (h : ∀ x, p (f x)) : (Σ y : Subtype p, { x : α // f x = y }) ≃ α := calc _ ≃ Σy : β, { x : α // f x = y } := sigmaSubtypeEquivOfSubset _ p fun _ ⟨x, h'⟩ => h' ▸ h x _ ≃ α := sigmaFiberEquiv f #align equiv.sigma_subtype_fiber_equiv Equiv.sigmaSubtypeFiberEquiv def sigmaSubtypeFiberEquivSubtype {α β : Type} (f : α → β) {p : α → Prop} {q : β → Prop} (h : ∀ x, p x ↔ q (f x)) : (Σ y : Subtype q, { x : α // f x = y }) ≃ Subtype p := calc (Σy : Subtype q, { x : α // f x = y }) ≃ Σy : Subtype q, { x : Subtype p // Subtype.mk (f x) ((h x).1 x.2) = y } := by { apply sigmaCongrRight intro y apply Equiv.symm refine (subtypeSubtypeEquivSubtypeExists _ _).trans (subtypeEquivRight ?_) intro x exact ⟨fun ⟨hp, h'⟩ => congr_arg Subtype.val h', fun h' => ⟨(h x).2 (h'.symm ▸ y.2), Subtype.eq h'⟩⟩ } _ ≃ Subtype p := sigmaFiberEquiv fun x : Subtype p => (⟨f x, (h x).1 x.property⟩ : Subtype q) #align equiv.sigma_subtype_fiber_equiv_subtype Equiv.sigmaSubtypeFiberEquivSubtype def sigmaOptionEquivOfSome (p : Option α → Type v) (h : p none → False) : (Σ x : Option α, p x) ≃ Σ x : α, p (some x) := haveI h' : ∀ x, p x → x.isSome := by intro x cases x · intro n exfalso exact h n · intro _ exact rfl (sigmaSubtypeEquivOfSubset _ _ h').symm.trans (sigmaCongrLeft' (optionIsSomeEquiv α)) #align equiv.sigma_option_equiv_of_some Equiv.sigmaOptionEquivOfSome def piEquivSubtypeSigma (ι) (π : ι → Type) : (∀ i, π i) ≃ { f : ι → Σ i, π i // ∀ i, (f i).1 = i } where toFun := fun f => ⟨fun i => ⟨i, f i⟩, fun i => rfl⟩ invFun := fun f i => by rw [← f.2 i]; exact (f.1 i).2 left_inv := fun f => funext fun i => rfl right_inv := fun ⟨f, hf⟩ => Subtype.eq <\| funext fun i => Sigma.eq (hf i).symm <\| eq_of_heq <\| rec_heq_of_heq _ <\| by simp #align equiv.pi_equiv_subtype_sigma Equiv.piEquivSubtypeSigma def subtypePiEquivPi {β : α → Sort v} {p : ∀ a, β a → Prop} : { f : ∀ a, β a // ∀ a, p a (f a) } ≃ ∀ a, { b : β a // p a b } where toFun := fun f a => ⟨f.1 a, f.2 a⟩ invFun := fun f => ⟨fun a => (f a).1, fun a => (f a).2⟩ left_inv := by rintro ⟨f, h⟩ rfl right_inv := by rintro f funext a exact Subtype.ext_val rfl #align equiv.subtype_pi_equiv_pi Equiv.subtypePiEquivPi def subtypeProdEquivProd {p : α → Prop} {q : β → Prop} : { c : α × β // p c.1 ∧ q c.2 } ≃ { a // p a } × { b // q b } where toFun := fun x => ⟨⟨x.1.1, x.2.1⟩, ⟨x.1.2, x.2.2⟩⟩ invFun := fun x => ⟨⟨x.1.1, x.2.1⟩, ⟨x.1.2, x.2.2⟩⟩ left_inv := fun ⟨⟨_, _⟩, ⟨_, _⟩⟩ => rfl right_inv := fun ⟨⟨_, _⟩, ⟨_, _⟩⟩ => rfl #align equiv.subtype_prod_equiv_prod Equiv.subtypeProdEquivProd def prodSubtypeFstEquivSubtypeProd {p : α → Prop} : {s : α × β // p s.1} ≃ {a // p a} × β where toFun x := ⟨⟨x.1.1, x.2⟩, x.1.2⟩ invFun x := ⟨⟨x.1.1, x.2⟩, x.1.2⟩ left_inv _ := rfl right_inv _ := rfl def subtypeProdEquivSigmaSubtype (p : α → β → Prop) : { x : α × β // p x.1 x.2 } ≃ Σa, { b : β // p a b } where toFun x := ⟨x.1.1, x.1.2, x.property⟩ invFun x := ⟨⟨x.1, x.2⟩, x.2.property⟩ left_inv x := by ext <;> rfl right_inv := fun ⟨a, b, pab⟩ => rfl #align equiv.subtype_prod_equiv_sigma_subtype Equiv.subtypeProdEquivSigmaSubtype @[simps] def piEquivPiSubtypeProd {α : Type} (p : α → Prop) (β : α → Type) [DecidablePred p] : (∀ i : α, β i) ≃ (∀ i : { x // p x }, β i) × ∀ i : { x // ¬p x }, β i where toFun f := (fun x => f x, fun x => f x) invFun f x := if h : p x then f.1 ⟨x, h⟩ else f.2 ⟨x, h⟩ right_inv := by rintro ⟨f, g⟩ ext1 <;> · ext y rcases y with ⟨val, property⟩ simp only [property, dif_pos, dif_neg, not_false_iff, Subtype.coe_mk] left_inv f := by ext x by_cases h:p x <;> · simp only [h, dif_neg, dif_pos, not_false_iff] #align equiv.pi_equiv_pi_subtype_prod Equiv.piEquivPiSubtypeProd #align equiv.pi_equiv_pi_subtype_prod_symm_apply Equiv.piEquivPiSubtypeProd_symm_apply #align equiv.pi_equiv_pi_subtype_prod_apply Equiv.piEquivPiSubtypeProd_apply @[simps] def piSplitAt {α : Type} [DecidableEq α] (i : α) (β : α → Type) : (∀ j, β j) ≃ β i × ∀ j : { j // j ≠ i }, β j where toFun f := ⟨f i, fun j => f j⟩ invFun f j := if h : j = i then h.symm.rec f.1 else f.2 ⟨j, h⟩ right_inv f := by ext x exacts [dif_pos rfl, (dif_neg x.2).trans (by cases x; rfl)] left_inv f := by ext x dsimp only split_ifs with h · subst h; rfl · rfl #align equiv.pi_split_at Equiv.piSplitAt #align equiv.pi_split_at_apply Equiv.piSplitAt_apply #align equiv.pi_split_at_symm_apply Equiv.piSplitAt_symm_apply @[simps!] def funSplitAt {α : Type} [DecidableEq α] (i : α) (β : Type) : (α → β) ≃ β × ({ j // j ≠ i } → β) := piSplitAt i _ #align equiv.fun_split_at Equiv.funSplitAt #align equiv.fun_split_at_symm_apply Equiv.funSplitAt_symm_apply #align equiv.fun_split_at_apply Equiv.funSplitAt_apply end instance : CanLift (α → β) (α ≃ β) (↑) Bijective where prf f hf := ⟨ofBijective f hf, rfl⟩ section variable {α' β' : Type} (e : Perm α') {p : β' → Prop} [DecidablePred p] (f : α' ≃ Subtype p) def Perm.extendDomain : Perm β' := (permCongr f e).subtypeCongr (Equiv.refl _) #align equiv.perm.extend_domain Equiv.Perm.extendDomain @[simp] theorem Perm.extendDomain_apply_image (a : α') : e.extendDomain f (f a) = f (e a) := by simp [Perm.extendDomain] #align equiv.perm.extend_domain_apply_image Equiv.Perm.extendDomain_apply_image theorem Perm.extendDomain_apply_subtype {b : β'} (h : p b) : e.extendDomain f b = f (e (f.symm ⟨b, h⟩)) := by simp [Perm.extendDomain, h] #align equiv.perm.extend_domain_apply_subtype Equiv.Perm.extendDomain_apply_subtype theorem Perm.extendDomain_apply_not_subtype {b : β'} (h : ¬p b) : e.extendDomain f b = b := by simp [Perm.extendDomain, h] #align equiv.perm.extend_domain_apply_not_subtype Equiv.Perm.extendDomain_apply_not_subtype @[simp] theorem Perm.extendDomain_refl : Perm.extendDomain (Equiv.refl _) f = Equiv.refl _ := by simp [Perm.extendDomain] #align equiv.perm.extend_domain_refl Equiv.Perm.extendDomain_refl @[simp] theorem Perm.extendDomain_symm : (e.extendDomain f).symm = Perm.extendDomain e.symm f := rfl #align equiv.perm.extend_domain_symm Equiv.Perm.extendDomain_symm theorem Perm.extendDomain_trans (e e' : Perm α') : (e.extendDomain f).trans (e'.extendDomain f) = Perm.extendDomain (e.trans e') f := by simp [Perm.extendDomain, permCongr_trans] #align equiv.perm.extend_domain_trans Equiv.Perm.extendDomain_trans end def subtypeQuotientEquivQuotientSubtype (p₁ : α → Prop) {s₁ : Setoid α} {s₂ : Setoid (Subtype p₁)} (p₂ : Quotient s₁ → Prop) (hp₂ : ∀ a, p₁ a ↔ p₂ ⟦a⟧) (h : ∀ x y : Subtype p₁, s₂.r x y ↔ s₁.r x y) : {x // p₂ x} ≃ Quotient s₂ where toFun a := Quotient.hrecOn a.1 (fun a h => ⟦⟨a, (hp₂ _).2 h⟩⟧) (fun a b hab => hfunext (by rw [Quotient.sound hab]) fun h₁ h₂ _ => heq_of_eq (Quotient.sound ((h _ _).2 hab))) a.2 invFun a := Quotient.liftOn a (fun a => (⟨⟦a.1⟧, (hp₂ _).1 a.2⟩ : { x // p₂ x })) fun a b hab => Subtype.ext_val (Quotient.sound ((h _ _).1 hab)) left_inv := by exact fun ⟨a, ha⟩ => Quotient.inductionOn a (fun b hb => rfl) ha right_inv a := Quotient.inductionOn a fun ⟨a, ha⟩ => rfl #align equiv.subtype_quotient_equiv_quotient_subtype Equiv.subtypeQuotientEquivQuotientSubtype @[simp] theorem subtypeQuotientEquivQuotientSubtype_mk (p₁ : α → Prop) [s₁ : Setoid α] [s₂ : Setoid (Subtype p₁)] (p₂ : Quotient s₁ → Prop) (hp₂ : ∀ a, p₁ a ↔ p₂ ⟦a⟧) (h : ∀ x y : Subtype p₁, @Setoid.r _ s₂ x y ↔ (x : α) ≈ y) (x hx) : subtypeQuotientEquivQuotientSubtype p₁ p₂ hp₂ h ⟨⟦x⟧, hx⟩ = ⟦⟨x, (hp₂ _).2 hx⟩⟧ := rfl #align equiv.subtype_quotient_equiv_quotient_subtype_mk Equiv.subtypeQuotientEquivQuotientSubtype_mk @[simp] theorem subtypeQuotientEquivQuotientSubtype_symm_mk (p₁ : α → Prop) [s₁ : Setoid α] [s₂ : Setoid (Subtype p₁)] (p₂ : Quotient s₁ → Prop) (hp₂ : ∀ a, p₁ a ↔ p₂ ⟦a⟧) (h : ∀ x y : Subtype p₁, @Setoid.r _ s₂ x y ↔ (x : α) ≈ y) (x) : (subtypeQuotientEquivQuotientSubtype p₁ p₂ hp₂ h).symm ⟦x⟧ = ⟨⟦x⟧, (hp₂ _).1 x.property⟩ := rfl #align equiv.subtype_quotient_equiv_quotient_subtype_symm_mk Equiv.subtypeQuotientEquivQuotientSubtype_symm_mk section Swap variable [DecidableEq α] def swapCore (a b r : α) : α := if r = a then b else if r = b then a else r #align equiv.swap_core Equiv.swapCore theorem swapCore_self (r a : α) : swapCore a a r = r := by unfold swapCore split_ifs <;> simp [] #align equiv.swap_core_self Equiv.swapCore_self theorem swapCore_swapCore (r a b : α) : swapCore a b (swapCore a b r) = r := by unfold swapCore -- Porting note: cc missing. -- `casesm` would work here, with `casesm _ = _, ¬ _ = _`, -- if it would just continue past failures on hypotheses matching the pattern split_ifs with h₁ h₂ h₃ h₄ h₅ · subst h₁; exact h₂ · subst h₁; rfl · cases h₃ rfl · exact h₄.symm · cases h₅ rfl · cases h₅ rfl · rfl #align equiv.swap_core_swap_core Equiv.swapCore_swapCore theorem swapCore_comm (r a b : α) : swapCore a b r = swapCore b a r := by unfold swapCore -- Porting note: whatever solution works for `swapCore_swapCore` will work here too. split_ifs with h₁ h₂ h₃ <;> try simp · cases h₁; cases h₂; rfl #align equiv.swap_core_comm Equiv.swapCore_comm def swap (a b : α) : Perm α := ⟨swapCore a b, swapCore a b, fun r => swapCore_swapCore r a b, fun r => swapCore_swapCore r a b⟩ #align equiv.swap Equiv.swap @[simp] theorem swap_self (a : α) : swap a a = Equiv.refl _ := ext fun r => swapCore_self r a #align equiv.swap_self Equiv.swap_self theorem swap_comm (a b : α) : swap a b = swap b a := ext fun r => swapCore_comm r _ _ #align equiv.swap_comm Equiv.swap_comm theorem swap_apply_def (a b x : α) : swap a b x = if x = a then b else if x = b then a else x := rfl #align equiv.swap_apply_def Equiv.swap_apply_def @[simp] theorem swap_apply_left (a b : α) : swap a b a = b := if_pos rfl #align equiv.swap_apply_left Equiv.swap_apply_left @[simp] theorem swap_apply_right (a b : α) : swap a b b = a := by by_cases h:b = a <;> simp [swap_apply_def, h] #align equiv.swap_apply_right Equiv.swap_apply_right theorem swap_apply_of_ne_of_ne {a b x : α} : x ≠ a → x ≠ b → swap a b x = x := by simp (config := { contextual := true }) [swap_apply_def] #align equiv.swap_apply_of_ne_of_ne Equiv.swap_apply_of_ne_of_ne theorem eq_or_eq_of_swap_apply_ne_self {a b x : α} (h : swap a b x ≠ x) : x = a ∨ x = b := by contrapose! h exact swap_apply_of_ne_of_ne h.1 h.2 @[simp] theorem swap_swap (a b : α) : (swap a b).trans (swap a b) = Equiv.refl _ := ext fun _ => swapCore_swapCore _ _ _ #align equiv.swap_swap Equiv.swap_swap @[simp] theorem symm_swap (a b : α) : (swap a b).symm = swap a b := rfl #align equiv.symm_swap Equiv.symm_swap @[simp] theorem swap_eq_refl_iff {x y : α} : swap x y = Equiv.refl _ ↔ x = y := by refine ⟨fun h => (Equiv.refl _).injective ?_, fun h => h ▸ swap_self _⟩ rw [← h, swap_apply_left, h, refl_apply] #align equiv.swap_eq_refl_iff Equiv.swap_eq_refl_iff theorem swap_comp_apply {a b x : α} (π : Perm α) : π.trans (swap a b) x = if π x = a then b else if π x = b then a else π x := by cases π rfl #align equiv.swap_comp_apply Equiv.swap_comp_apply theorem swap_eq_update (i j : α) : (Equiv.swap i j : α → α) = update (update id j i) i j := funext fun x => by rw [update_apply _ i j, update_apply _ j i, Equiv.swap_apply_def, id] #align equiv.swap_eq_update Equiv.swap_eq_update	Mathlib/Logic/Equiv/Basic.lean	1,695	1,697	theorem comp_swap_eq_update (i j : α) (f : α → β) : f ∘ Equiv.swap i j = update (update f j (f i)) i (f j) := by	rw [swap_eq_update, comp_update, comp_update, comp_id]
import Mathlib.Algebra.GroupPower.IterateHom import Mathlib.Analysis.SpecificLimits.Basic import Mathlib.Order.Iterate import Mathlib.Order.SemiconjSup import Mathlib.Tactic.Monotonicity import Mathlib.Topology.Order.MonotoneContinuity #align_import dynamics.circle.rotation_number.translation_number from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" open scoped Classical open Filter Set Int Topology open Function hiding Commute structure CircleDeg1Lift extends ℝ →o ℝ : Type where map_add_one' : ∀ x, toFun (x + 1) = toFun x + 1 #align circle_deg1_lift CircleDeg1Lift namespace CircleDeg1Lift instance : FunLike CircleDeg1Lift ℝ ℝ where coe f := f.toFun coe_injective' \| ⟨⟨_, _⟩, _⟩, ⟨⟨_, _⟩, _⟩, rfl => rfl instance : OrderHomClass CircleDeg1Lift ℝ ℝ where map_rel f _ _ h := f.monotone' h @[simp] theorem coe_mk (f h) : ⇑(mk f h) = f := rfl #align circle_deg1_lift.coe_mk CircleDeg1Lift.coe_mk variable (f g : CircleDeg1Lift) @[simp] theorem coe_toOrderHom : ⇑f.toOrderHom = f := rfl protected theorem monotone : Monotone f := f.monotone' #align circle_deg1_lift.monotone CircleDeg1Lift.monotone @[mono] theorem mono {x y} (h : x ≤ y) : f x ≤ f y := f.monotone h #align circle_deg1_lift.mono CircleDeg1Lift.mono theorem strictMono_iff_injective : StrictMono f ↔ Injective f := f.monotone.strictMono_iff_injective #align circle_deg1_lift.strict_mono_iff_injective CircleDeg1Lift.strictMono_iff_injective @[simp] theorem map_add_one : ∀ x, f (x + 1) = f x + 1 := f.map_add_one' #align circle_deg1_lift.map_add_one CircleDeg1Lift.map_add_one @[simp] theorem map_one_add (x : ℝ) : f (1 + x) = 1 + f x := by rw [add_comm, map_add_one, add_comm 1] #align circle_deg1_lift.map_one_add CircleDeg1Lift.map_one_add #noalign circle_deg1_lift.coe_inj -- Use `DFunLike.coe_inj` @[ext] theorem ext ⦃f g : CircleDeg1Lift⦄ (h : ∀ x, f x = g x) : f = g := DFunLike.ext f g h #align circle_deg1_lift.ext CircleDeg1Lift.ext theorem ext_iff {f g : CircleDeg1Lift} : f = g ↔ ∀ x, f x = g x := DFunLike.ext_iff #align circle_deg1_lift.ext_iff CircleDeg1Lift.ext_iff instance : Monoid CircleDeg1Lift where mul f g := { toOrderHom := f.1.comp g.1 map_add_one' := fun x => by simp [map_add_one] } one := ⟨.id, fun _ => rfl⟩ mul_one f := rfl one_mul f := rfl mul_assoc f₁ f₂ f₃ := DFunLike.coe_injective rfl instance : Inhabited CircleDeg1Lift := ⟨1⟩ @[simp] theorem coe_mul : ⇑(f * g) = f ∘ g := rfl #align circle_deg1_lift.coe_mul CircleDeg1Lift.coe_mul theorem mul_apply (x) : (f * g) x = f (g x) := rfl #align circle_deg1_lift.mul_apply CircleDeg1Lift.mul_apply @[simp] theorem coe_one : ⇑(1 : CircleDeg1Lift) = id := rfl #align circle_deg1_lift.coe_one CircleDeg1Lift.coe_one instance unitsHasCoeToFun : CoeFun CircleDeg1Liftˣ fun _ => ℝ → ℝ := ⟨fun f => ⇑(f : CircleDeg1Lift)⟩ #align circle_deg1_lift.units_has_coe_to_fun CircleDeg1Lift.unitsHasCoeToFun #noalign circle_deg1_lift.units_coe -- now LHS = RHS @[simp] theorem units_inv_apply_apply (f : CircleDeg1Liftˣ) (x : ℝ) : (f⁻¹ : CircleDeg1Liftˣ) (f x) = x := by simp only [← mul_apply, f.inv_mul, coe_one, id] #align circle_deg1_lift.units_inv_apply_apply CircleDeg1Lift.units_inv_apply_apply @[simp] theorem units_apply_inv_apply (f : CircleDeg1Liftˣ) (x : ℝ) : f ((f⁻¹ : CircleDeg1Liftˣ) x) = x := by simp only [← mul_apply, f.mul_inv, coe_one, id] #align circle_deg1_lift.units_apply_inv_apply CircleDeg1Lift.units_apply_inv_apply def toOrderIso : CircleDeg1Liftˣ →* ℝ ≃o ℝ where toFun f := { toFun := f invFun := ⇑f⁻¹ left_inv := units_inv_apply_apply f right_inv := units_apply_inv_apply f map_rel_iff' := ⟨fun h => by simpa using mono (↑f⁻¹) h, mono f⟩ } map_one' := rfl map_mul' f g := rfl #align circle_deg1_lift.to_order_iso CircleDeg1Lift.toOrderIso @[simp] theorem coe_toOrderIso (f : CircleDeg1Liftˣ) : ⇑(toOrderIso f) = f := rfl #align circle_deg1_lift.coe_to_order_iso CircleDeg1Lift.coe_toOrderIso @[simp] theorem coe_toOrderIso_symm (f : CircleDeg1Liftˣ) : ⇑(toOrderIso f).symm = (f⁻¹ : CircleDeg1Liftˣ) := rfl #align circle_deg1_lift.coe_to_order_iso_symm CircleDeg1Lift.coe_toOrderIso_symm @[simp] theorem coe_toOrderIso_inv (f : CircleDeg1Liftˣ) : ⇑(toOrderIso f)⁻¹ = (f⁻¹ : CircleDeg1Liftˣ) := rfl #align circle_deg1_lift.coe_to_order_iso_inv CircleDeg1Lift.coe_toOrderIso_inv theorem isUnit_iff_bijective {f : CircleDeg1Lift} : IsUnit f ↔ Bijective f := ⟨fun ⟨u, h⟩ => h ▸ (toOrderIso u).bijective, fun h => Units.isUnit { val := f inv := { toFun := (Equiv.ofBijective f h).symm monotone' := fun x y hxy => (f.strictMono_iff_injective.2 h.1).le_iff_le.1 (by simp only [Equiv.ofBijective_apply_symm_apply f h, hxy]) map_add_one' := fun x => h.1 <\| by simp only [Equiv.ofBijective_apply_symm_apply f, f.map_add_one] } val_inv := ext <\| Equiv.ofBijective_apply_symm_apply f h inv_val := ext <\| Equiv.ofBijective_symm_apply_apply f h }⟩ #align circle_deg1_lift.is_unit_iff_bijective CircleDeg1Lift.isUnit_iff_bijective theorem coe_pow : ∀ n : ℕ, ⇑(f ^ n) = f^[n] \| 0 => rfl \| n + 1 => by ext x simp [coe_pow n, pow_succ] #align circle_deg1_lift.coe_pow CircleDeg1Lift.coe_pow theorem semiconjBy_iff_semiconj {f g₁ g₂ : CircleDeg1Lift} : SemiconjBy f g₁ g₂ ↔ Semiconj f g₁ g₂ := ext_iff #align circle_deg1_lift.semiconj_by_iff_semiconj CircleDeg1Lift.semiconjBy_iff_semiconj theorem commute_iff_commute {f g : CircleDeg1Lift} : Commute f g ↔ Function.Commute f g := ext_iff #align circle_deg1_lift.commute_iff_commute CircleDeg1Lift.commute_iff_commute def translate : Multiplicative ℝ →* CircleDeg1Liftˣ := MonoidHom.toHomUnits <\| { toFun := fun x => ⟨⟨fun y => Multiplicative.toAdd x + y, fun _ _ h => add_le_add_left h _⟩, fun _ => (add_assoc _ _ _).symm⟩ map_one' := ext <\| zero_add map_mul' := fun _ _ => ext <\| add_assoc _ _ } #align circle_deg1_lift.translate CircleDeg1Lift.translate @[simp] theorem translate_apply (x y : ℝ) : translate (Multiplicative.ofAdd x) y = x + y := rfl #align circle_deg1_lift.translate_apply CircleDeg1Lift.translate_apply @[simp] theorem translate_inv_apply (x y : ℝ) : (translate <\| Multiplicative.ofAdd x)⁻¹ y = -x + y := rfl #align circle_deg1_lift.translate_inv_apply CircleDeg1Lift.translate_inv_apply @[simp] theorem translate_zpow (x : ℝ) (n : ℤ) : translate (Multiplicative.ofAdd x) ^ n = translate (Multiplicative.ofAdd <\| ↑n * x) := by simp only [← zsmul_eq_mul, ofAdd_zsmul, MonoidHom.map_zpow] #align circle_deg1_lift.translate_zpow CircleDeg1Lift.translate_zpow @[simp] theorem translate_pow (x : ℝ) (n : ℕ) : translate (Multiplicative.ofAdd x) ^ n = translate (Multiplicative.ofAdd <\| ↑n * x) := translate_zpow x n #align circle_deg1_lift.translate_pow CircleDeg1Lift.translate_pow @[simp] theorem translate_iterate (x : ℝ) (n : ℕ) : (translate (Multiplicative.ofAdd x))^[n] = translate (Multiplicative.ofAdd <\| ↑n * x) := by rw [← coe_pow, ← Units.val_pow_eq_pow_val, translate_pow] #align circle_deg1_lift.translate_iterate CircleDeg1Lift.translate_iterate theorem commute_nat_add (n : ℕ) : Function.Commute f (n + ·) := by simpa only [nsmul_one, add_left_iterate] using Function.Commute.iterate_right f.map_one_add n #align circle_deg1_lift.commute_nat_add CircleDeg1Lift.commute_nat_add theorem commute_add_nat (n : ℕ) : Function.Commute f (· + n) := by simp only [add_comm _ (n : ℝ), f.commute_nat_add n] #align circle_deg1_lift.commute_add_nat CircleDeg1Lift.commute_add_nat theorem commute_sub_nat (n : ℕ) : Function.Commute f (· - n) := by simpa only [sub_eq_add_neg] using (f.commute_add_nat n).inverses_right (Equiv.addRight _).right_inv (Equiv.addRight _).left_inv #align circle_deg1_lift.commute_sub_nat CircleDeg1Lift.commute_sub_nat theorem commute_add_int : ∀ n : ℤ, Function.Commute f (· + n) \| (n : ℕ) => f.commute_add_nat n \| -[n+1] => by simpa [sub_eq_add_neg] using f.commute_sub_nat (n + 1) #align circle_deg1_lift.commute_add_int CircleDeg1Lift.commute_add_int theorem commute_int_add (n : ℤ) : Function.Commute f (n + ·) := by simpa only [add_comm _ (n : ℝ)] using f.commute_add_int n #align circle_deg1_lift.commute_int_add CircleDeg1Lift.commute_int_add theorem commute_sub_int (n : ℤ) : Function.Commute f (· - n) := by simpa only [sub_eq_add_neg] using (f.commute_add_int n).inverses_right (Equiv.addRight _).right_inv (Equiv.addRight _).left_inv #align circle_deg1_lift.commute_sub_int CircleDeg1Lift.commute_sub_int @[simp] theorem map_int_add (m : ℤ) (x : ℝ) : f (m + x) = m + f x := f.commute_int_add m x #align circle_deg1_lift.map_int_add CircleDeg1Lift.map_int_add @[simp] theorem map_add_int (x : ℝ) (m : ℤ) : f (x + m) = f x + m := f.commute_add_int m x #align circle_deg1_lift.map_add_int CircleDeg1Lift.map_add_int @[simp] theorem map_sub_int (x : ℝ) (n : ℤ) : f (x - n) = f x - n := f.commute_sub_int n x #align circle_deg1_lift.map_sub_int CircleDeg1Lift.map_sub_int @[simp] theorem map_add_nat (x : ℝ) (n : ℕ) : f (x + n) = f x + n := f.map_add_int x n #align circle_deg1_lift.map_add_nat CircleDeg1Lift.map_add_nat @[simp] theorem map_nat_add (n : ℕ) (x : ℝ) : f (n + x) = n + f x := f.map_int_add n x #align circle_deg1_lift.map_nat_add CircleDeg1Lift.map_nat_add @[simp] theorem map_sub_nat (x : ℝ) (n : ℕ) : f (x - n) = f x - n := f.map_sub_int x n #align circle_deg1_lift.map_sub_nat CircleDeg1Lift.map_sub_nat theorem map_int_of_map_zero (n : ℤ) : f n = f 0 + n := by rw [← f.map_add_int, zero_add] #align circle_deg1_lift.map_int_of_map_zero CircleDeg1Lift.map_int_of_map_zero @[simp] theorem map_fract_sub_fract_eq (x : ℝ) : f (fract x) - fract x = f x - x := by rw [Int.fract, f.map_sub_int, sub_sub_sub_cancel_right] #align circle_deg1_lift.map_fract_sub_fract_eq CircleDeg1Lift.map_fract_sub_fract_eq noncomputable instance : Lattice CircleDeg1Lift where sup f g := { toFun := fun x => max (f x) (g x) monotone' := fun x y h => max_le_max (f.mono h) (g.mono h) -- TODO: generalize to `Monotone.max` map_add_one' := fun x => by simp [max_add_add_right] } le f g := ∀ x, f x ≤ g x le_refl f x := le_refl (f x) le_trans f₁ f₂ f₃ h₁₂ h₂₃ x := le_trans (h₁₂ x) (h₂₃ x) le_antisymm f₁ f₂ h₁₂ h₂₁ := ext fun x => le_antisymm (h₁₂ x) (h₂₁ x) le_sup_left f g x := le_max_left (f x) (g x) le_sup_right f g x := le_max_right (f x) (g x) sup_le f₁ f₂ f₃ h₁ h₂ x := max_le (h₁ x) (h₂ x) inf f g := { toFun := fun x => min (f x) (g x) monotone' := fun x y h => min_le_min (f.mono h) (g.mono h) map_add_one' := fun x => by simp [min_add_add_right] } inf_le_left f g x := min_le_left (f x) (g x) inf_le_right f g x := min_le_right (f x) (g x) le_inf f₁ f₂ f₃ h₂ h₃ x := le_min (h₂ x) (h₃ x) @[simp] theorem sup_apply (x : ℝ) : (f ⊔ g) x = max (f x) (g x) := rfl #align circle_deg1_lift.sup_apply CircleDeg1Lift.sup_apply @[simp] theorem inf_apply (x : ℝ) : (f ⊓ g) x = min (f x) (g x) := rfl #align circle_deg1_lift.inf_apply CircleDeg1Lift.inf_apply theorem iterate_monotone (n : ℕ) : Monotone fun f : CircleDeg1Lift => f^[n] := fun f _ h => f.monotone.iterate_le_of_le h _ #align circle_deg1_lift.iterate_monotone CircleDeg1Lift.iterate_monotone theorem iterate_mono {f g : CircleDeg1Lift} (h : f ≤ g) (n : ℕ) : f^[n] ≤ g^[n] := iterate_monotone n h #align circle_deg1_lift.iterate_mono CircleDeg1Lift.iterate_mono theorem pow_mono {f g : CircleDeg1Lift} (h : f ≤ g) (n : ℕ) : f ^ n ≤ g ^ n := fun x => by simp only [coe_pow, iterate_mono h n x] #align circle_deg1_lift.pow_mono CircleDeg1Lift.pow_mono theorem pow_monotone (n : ℕ) : Monotone fun f : CircleDeg1Lift => f ^ n := fun _ _ h => pow_mono h n #align circle_deg1_lift.pow_monotone CircleDeg1Lift.pow_monotone theorem map_le_of_map_zero (x : ℝ) : f x ≤ f 0 + ⌈x⌉ := calc f x ≤ f ⌈x⌉ := f.monotone <\| le_ceil _ _ = f 0 + ⌈x⌉ := f.map_int_of_map_zero _ #align circle_deg1_lift.map_le_of_map_zero CircleDeg1Lift.map_le_of_map_zero theorem map_map_zero_le : f (g 0) ≤ f 0 + ⌈g 0⌉ := f.map_le_of_map_zero (g 0) #align circle_deg1_lift.map_map_zero_le CircleDeg1Lift.map_map_zero_le theorem floor_map_map_zero_le : ⌊f (g 0)⌋ ≤ ⌊f 0⌋ + ⌈g 0⌉ := calc ⌊f (g 0)⌋ ≤ ⌊f 0 + ⌈g 0⌉⌋ := floor_mono <\| f.map_map_zero_le g _ = ⌊f 0⌋ + ⌈g 0⌉ := floor_add_int _ _ #align circle_deg1_lift.floor_map_map_zero_le CircleDeg1Lift.floor_map_map_zero_le theorem ceil_map_map_zero_le : ⌈f (g 0)⌉ ≤ ⌈f 0⌉ + ⌈g 0⌉ := calc ⌈f (g 0)⌉ ≤ ⌈f 0 + ⌈g 0⌉⌉ := ceil_mono <\| f.map_map_zero_le g _ = ⌈f 0⌉ + ⌈g 0⌉ := ceil_add_int _ _ #align circle_deg1_lift.ceil_map_map_zero_le CircleDeg1Lift.ceil_map_map_zero_le theorem map_map_zero_lt : f (g 0) < f 0 + g 0 + 1 := calc f (g 0) ≤ f 0 + ⌈g 0⌉ := f.map_map_zero_le g _ < f 0 + (g 0 + 1) := add_lt_add_left (ceil_lt_add_one _) _ _ = f 0 + g 0 + 1 := (add_assoc _ _ _).symm #align circle_deg1_lift.map_map_zero_lt CircleDeg1Lift.map_map_zero_lt theorem le_map_of_map_zero (x : ℝ) : f 0 + ⌊x⌋ ≤ f x := calc f 0 + ⌊x⌋ = f ⌊x⌋ := (f.map_int_of_map_zero _).symm _ ≤ f x := f.monotone <\| floor_le _ #align circle_deg1_lift.le_map_of_map_zero CircleDeg1Lift.le_map_of_map_zero theorem le_map_map_zero : f 0 + ⌊g 0⌋ ≤ f (g 0) := f.le_map_of_map_zero (g 0) #align circle_deg1_lift.le_map_map_zero CircleDeg1Lift.le_map_map_zero theorem le_floor_map_map_zero : ⌊f 0⌋ + ⌊g 0⌋ ≤ ⌊f (g 0)⌋ := calc ⌊f 0⌋ + ⌊g 0⌋ = ⌊f 0 + ⌊g 0⌋⌋ := (floor_add_int _ _).symm _ ≤ ⌊f (g 0)⌋ := floor_mono <\| f.le_map_map_zero g #align circle_deg1_lift.le_floor_map_map_zero CircleDeg1Lift.le_floor_map_map_zero theorem le_ceil_map_map_zero : ⌈f 0⌉ + ⌊g 0⌋ ≤ ⌈(f * g) 0⌉ := calc ⌈f 0⌉ + ⌊g 0⌋ = ⌈f 0 + ⌊g 0⌋⌉ := (ceil_add_int _ _).symm _ ≤ ⌈f (g 0)⌉ := ceil_mono <\| f.le_map_map_zero g #align circle_deg1_lift.le_ceil_map_map_zero CircleDeg1Lift.le_ceil_map_map_zero theorem lt_map_map_zero : f 0 + g 0 - 1 < f (g 0) := calc f 0 + g 0 - 1 = f 0 + (g 0 - 1) := add_sub_assoc _ _ _ _ < f 0 + ⌊g 0⌋ := add_lt_add_left (sub_one_lt_floor _) _ _ ≤ f (g 0) := f.le_map_map_zero g #align circle_deg1_lift.lt_map_map_zero CircleDeg1Lift.lt_map_map_zero theorem dist_map_map_zero_lt : dist (f 0 + g 0) (f (g 0)) < 1 := by rw [dist_comm, Real.dist_eq, abs_lt, lt_sub_iff_add_lt', sub_lt_iff_lt_add', ← sub_eq_add_neg] exact ⟨f.lt_map_map_zero g, f.map_map_zero_lt g⟩ #align circle_deg1_lift.dist_map_map_zero_lt CircleDeg1Lift.dist_map_map_zero_lt theorem dist_map_zero_lt_of_semiconj {f g₁ g₂ : CircleDeg1Lift} (h : Function.Semiconj f g₁ g₂) : dist (g₁ 0) (g₂ 0) < 2 := calc dist (g₁ 0) (g₂ 0) ≤ dist (g₁ 0) (f (g₁ 0) - f 0) + dist _ (g₂ 0) := dist_triangle _ _ _ _ = dist (f 0 + g₁ 0) (f (g₁ 0)) + dist (g₂ 0 + f 0) (g₂ (f 0)) := by simp only [h.eq, Real.dist_eq, sub_sub, add_comm (f 0), sub_sub_eq_add_sub, abs_sub_comm (g₂ (f 0))] _ < 1 + 1 := add_lt_add (f.dist_map_map_zero_lt g₁) (g₂.dist_map_map_zero_lt f) _ = 2 := one_add_one_eq_two #align circle_deg1_lift.dist_map_zero_lt_of_semiconj CircleDeg1Lift.dist_map_zero_lt_of_semiconj theorem dist_map_zero_lt_of_semiconjBy {f g₁ g₂ : CircleDeg1Lift} (h : SemiconjBy f g₁ g₂) : dist (g₁ 0) (g₂ 0) < 2 := dist_map_zero_lt_of_semiconj <\| semiconjBy_iff_semiconj.1 h #align circle_deg1_lift.dist_map_zero_lt_of_semiconj_by CircleDeg1Lift.dist_map_zero_lt_of_semiconjBy protected theorem tendsto_atBot : Tendsto f atBot atBot := tendsto_atBot_mono f.map_le_of_map_zero <\| tendsto_atBot_add_const_left _ _ <\| (tendsto_atBot_mono fun x => (ceil_lt_add_one x).le) <\| tendsto_atBot_add_const_right _ _ tendsto_id #align circle_deg1_lift.tendsto_at_bot CircleDeg1Lift.tendsto_atBot protected theorem tendsto_atTop : Tendsto f atTop atTop := tendsto_atTop_mono f.le_map_of_map_zero <\| tendsto_atTop_add_const_left _ _ <\| (tendsto_atTop_mono fun x => (sub_one_lt_floor x).le) <\| by simpa [sub_eq_add_neg] using tendsto_atTop_add_const_right _ _ tendsto_id #align circle_deg1_lift.tendsto_at_top CircleDeg1Lift.tendsto_atTop theorem continuous_iff_surjective : Continuous f ↔ Function.Surjective f := ⟨fun h => h.surjective f.tendsto_atTop f.tendsto_atBot, f.monotone.continuous_of_surjective⟩ #align circle_deg1_lift.continuous_iff_surjective CircleDeg1Lift.continuous_iff_surjective theorem iterate_le_of_map_le_add_int {x : ℝ} {m : ℤ} (h : f x ≤ x + m) (n : ℕ) : f^[n] x ≤ x + n * m := by simpa only [nsmul_eq_mul, add_right_iterate] using (f.commute_add_int m).iterate_le_of_map_le f.monotone (monotone_id.add_const (m : ℝ)) h n #align circle_deg1_lift.iterate_le_of_map_le_add_int CircleDeg1Lift.iterate_le_of_map_le_add_int theorem le_iterate_of_add_int_le_map {x : ℝ} {m : ℤ} (h : x + m ≤ f x) (n : ℕ) : x + n * m ≤ f^[n] x := by simpa only [nsmul_eq_mul, add_right_iterate] using (f.commute_add_int m).symm.iterate_le_of_map_le (monotone_id.add_const (m : ℝ)) f.monotone h n #align circle_deg1_lift.le_iterate_of_add_int_le_map CircleDeg1Lift.le_iterate_of_add_int_le_map theorem iterate_eq_of_map_eq_add_int {x : ℝ} {m : ℤ} (h : f x = x + m) (n : ℕ) : f^[n] x = x + n * m := by simpa only [nsmul_eq_mul, add_right_iterate] using (f.commute_add_int m).iterate_eq_of_map_eq n h #align circle_deg1_lift.iterate_eq_of_map_eq_add_int CircleDeg1Lift.iterate_eq_of_map_eq_add_int theorem iterate_pos_le_iff {x : ℝ} {m : ℤ} {n : ℕ} (hn : 0 < n) : f^[n] x ≤ x + n * m ↔ f x ≤ x + m := by simpa only [nsmul_eq_mul, add_right_iterate] using (f.commute_add_int m).iterate_pos_le_iff_map_le f.monotone (strictMono_id.add_const (m : ℝ)) hn #align circle_deg1_lift.iterate_pos_le_iff CircleDeg1Lift.iterate_pos_le_iff theorem iterate_pos_lt_iff {x : ℝ} {m : ℤ} {n : ℕ} (hn : 0 < n) : f^[n] x < x + n * m ↔ f x < x + m := by simpa only [nsmul_eq_mul, add_right_iterate] using (f.commute_add_int m).iterate_pos_lt_iff_map_lt f.monotone (strictMono_id.add_const (m : ℝ)) hn #align circle_deg1_lift.iterate_pos_lt_iff CircleDeg1Lift.iterate_pos_lt_iff theorem iterate_pos_eq_iff {x : ℝ} {m : ℤ} {n : ℕ} (hn : 0 < n) : f^[n] x = x + n * m ↔ f x = x + m := by simpa only [nsmul_eq_mul, add_right_iterate] using (f.commute_add_int m).iterate_pos_eq_iff_map_eq f.monotone (strictMono_id.add_const (m : ℝ)) hn #align circle_deg1_lift.iterate_pos_eq_iff CircleDeg1Lift.iterate_pos_eq_iff theorem le_iterate_pos_iff {x : ℝ} {m : ℤ} {n : ℕ} (hn : 0 < n) : x + n * m ≤ f^[n] x ↔ x + m ≤ f x := by simpa only [not_lt] using not_congr (f.iterate_pos_lt_iff hn) #align circle_deg1_lift.le_iterate_pos_iff CircleDeg1Lift.le_iterate_pos_iff theorem lt_iterate_pos_iff {x : ℝ} {m : ℤ} {n : ℕ} (hn : 0 < n) : x + n * m < f^[n] x ↔ x + m < f x := by simpa only [not_le] using not_congr (f.iterate_pos_le_iff hn) #align circle_deg1_lift.lt_iterate_pos_iff CircleDeg1Lift.lt_iterate_pos_iff theorem mul_floor_map_zero_le_floor_iterate_zero (n : ℕ) : ↑n * ⌊f 0⌋ ≤ ⌊f^[n] 0⌋ := by rw [le_floor, Int.cast_mul, Int.cast_natCast, ← zero_add ((n : ℝ) * _)] apply le_iterate_of_add_int_le_map simp [floor_le] #align circle_deg1_lift.mul_floor_map_zero_le_floor_iterate_zero CircleDeg1Lift.mul_floor_map_zero_le_floor_iterate_zero noncomputable section def transnumAuxSeq (n : ℕ) : ℝ := (f ^ (2 ^ n : ℕ)) 0 / 2 ^ n #align circle_deg1_lift.transnum_aux_seq CircleDeg1Lift.transnumAuxSeq def translationNumber : ℝ := limUnder atTop f.transnumAuxSeq #align circle_deg1_lift.translation_number CircleDeg1Lift.translationNumber end -- TODO: choose two different symbols for `CircleDeg1Lift.translationNumber` and the future -- `circle_mono_homeo.rotation_number`, then make them `localized notation`s local notation "τ" => translationNumber theorem transnumAuxSeq_def : f.transnumAuxSeq = fun n : ℕ => (f ^ (2 ^ n : ℕ)) 0 / 2 ^ n := rfl #align circle_deg1_lift.transnum_aux_seq_def CircleDeg1Lift.transnumAuxSeq_def theorem translationNumber_eq_of_tendsto_aux {τ' : ℝ} (h : Tendsto f.transnumAuxSeq atTop (𝓝 τ')) : τ f = τ' := h.limUnder_eq #align circle_deg1_lift.translation_number_eq_of_tendsto_aux CircleDeg1Lift.translationNumber_eq_of_tendsto_aux theorem translationNumber_eq_of_tendsto₀ {τ' : ℝ} (h : Tendsto (fun n : ℕ => f^[n] 0 / n) atTop (𝓝 τ')) : τ f = τ' := f.translationNumber_eq_of_tendsto_aux <\| by simpa [(· ∘ ·), transnumAuxSeq_def, coe_pow] using h.comp (Nat.tendsto_pow_atTop_atTop_of_one_lt one_lt_two) #align circle_deg1_lift.translation_number_eq_of_tendsto₀ CircleDeg1Lift.translationNumber_eq_of_tendsto₀ theorem translationNumber_eq_of_tendsto₀' {τ' : ℝ} (h : Tendsto (fun n : ℕ => f^[n + 1] 0 / (n + 1)) atTop (𝓝 τ')) : τ f = τ' := f.translationNumber_eq_of_tendsto₀ <\| (tendsto_add_atTop_iff_nat 1).1 (mod_cast h) #align circle_deg1_lift.translation_number_eq_of_tendsto₀' CircleDeg1Lift.translationNumber_eq_of_tendsto₀' theorem transnumAuxSeq_zero : f.transnumAuxSeq 0 = f 0 := by simp [transnumAuxSeq] #align circle_deg1_lift.transnum_aux_seq_zero CircleDeg1Lift.transnumAuxSeq_zero theorem transnumAuxSeq_dist_lt (n : ℕ) : dist (f.transnumAuxSeq n) (f.transnumAuxSeq (n + 1)) < 1 / 2 / 2 ^ n := by have : 0 < (2 ^ (n + 1) : ℝ) := pow_pos zero_lt_two _ rw [div_div, ← pow_succ', ← abs_of_pos this] replace := abs_pos.2 (ne_of_gt this) convert (div_lt_div_right this).2 ((f ^ 2 ^ n).dist_map_map_zero_lt (f ^ 2 ^ n)) using 1 simp_rw [transnumAuxSeq, Real.dist_eq] rw [← abs_div, sub_div, pow_succ, pow_succ', ← two_mul, mul_div_mul_left _ _ (two_ne_zero' ℝ), pow_mul, sq, mul_apply] #align circle_deg1_lift.transnum_aux_seq_dist_lt CircleDeg1Lift.transnumAuxSeq_dist_lt theorem tendsto_translationNumber_aux : Tendsto f.transnumAuxSeq atTop (𝓝 <\| τ f) := (cauchySeq_of_le_geometric_two 1 fun n => le_of_lt <\| f.transnumAuxSeq_dist_lt n).tendsto_limUnder #align circle_deg1_lift.tendsto_translation_number_aux CircleDeg1Lift.tendsto_translationNumber_aux theorem dist_map_zero_translationNumber_le : dist (f 0) (τ f) ≤ 1 := f.transnumAuxSeq_zero ▸ dist_le_of_le_geometric_two_of_tendsto₀ 1 (fun n => le_of_lt <\| f.transnumAuxSeq_dist_lt n) f.tendsto_translationNumber_aux #align circle_deg1_lift.dist_map_zero_translation_number_le CircleDeg1Lift.dist_map_zero_translationNumber_le theorem tendsto_translationNumber_of_dist_bounded_aux (x : ℕ → ℝ) (C : ℝ) (H : ∀ n : ℕ, dist ((f ^ n) 0) (x n) ≤ C) : Tendsto (fun n : ℕ => x (2 ^ n) / 2 ^ n) atTop (𝓝 <\| τ f) := by apply f.tendsto_translationNumber_aux.congr_dist (squeeze_zero (fun _ => dist_nonneg) _ _) · exact fun n => C / 2 ^ n · intro n have : 0 < (2 ^ n : ℝ) := pow_pos zero_lt_two _ convert (div_le_div_right this).2 (H (2 ^ n)) using 1 rw [transnumAuxSeq, Real.dist_eq, ← sub_div, abs_div, abs_of_pos this, Real.dist_eq] · exact mul_zero C ▸ tendsto_const_nhds.mul <\| tendsto_inv_atTop_zero.comp <\| tendsto_pow_atTop_atTop_of_one_lt one_lt_two #align circle_deg1_lift.tendsto_translation_number_of_dist_bounded_aux CircleDeg1Lift.tendsto_translationNumber_of_dist_bounded_aux theorem translationNumber_eq_of_dist_bounded {f g : CircleDeg1Lift} (C : ℝ) (H : ∀ n : ℕ, dist ((f ^ n) 0) ((g ^ n) 0) ≤ C) : τ f = τ g := Eq.symm <\| g.translationNumber_eq_of_tendsto_aux <\| f.tendsto_translationNumber_of_dist_bounded_aux _ C H #align circle_deg1_lift.translation_number_eq_of_dist_bounded CircleDeg1Lift.translationNumber_eq_of_dist_bounded @[simp] theorem translationNumber_one : τ 1 = 0 := translationNumber_eq_of_tendsto₀ _ <\| by simp [tendsto_const_nhds] #align circle_deg1_lift.translation_number_one CircleDeg1Lift.translationNumber_one theorem translationNumber_eq_of_semiconjBy {f g₁ g₂ : CircleDeg1Lift} (H : SemiconjBy f g₁ g₂) : τ g₁ = τ g₂ := translationNumber_eq_of_dist_bounded 2 fun n => le_of_lt <\| dist_map_zero_lt_of_semiconjBy <\| H.pow_right n #align circle_deg1_lift.translation_number_eq_of_semiconj_by CircleDeg1Lift.translationNumber_eq_of_semiconjBy theorem translationNumber_eq_of_semiconj {f g₁ g₂ : CircleDeg1Lift} (H : Function.Semiconj f g₁ g₂) : τ g₁ = τ g₂ := translationNumber_eq_of_semiconjBy <\| semiconjBy_iff_semiconj.2 H #align circle_deg1_lift.translation_number_eq_of_semiconj CircleDeg1Lift.translationNumber_eq_of_semiconj theorem translationNumber_mul_of_commute {f g : CircleDeg1Lift} (h : Commute f g) : τ (f * g) = τ f + τ g := by refine tendsto_nhds_unique ?_ (f.tendsto_translationNumber_aux.add g.tendsto_translationNumber_aux) simp only [transnumAuxSeq, ← add_div] refine (f * g).tendsto_translationNumber_of_dist_bounded_aux (fun n ↦ (f ^ n) 0 + (g ^ n) 0) 1 fun n ↦ ?_ rw [h.mul_pow, dist_comm] exact le_of_lt ((f ^ n).dist_map_map_zero_lt (g ^ n)) #align circle_deg1_lift.translation_number_mul_of_commute CircleDeg1Lift.translationNumber_mul_of_commute @[simp] theorem translationNumber_units_inv (f : CircleDeg1Liftˣ) : τ ↑f⁻¹ = -τ f := eq_neg_iff_add_eq_zero.2 <\| by simp [← translationNumber_mul_of_commute (Commute.refl _).units_inv_left] #align circle_deg1_lift.translation_number_units_inv CircleDeg1Lift.translationNumber_units_inv @[simp] theorem translationNumber_pow : ∀ n : ℕ, τ (f ^ n) = n * τ f \| 0 => by simp \| n + 1 => by rw [pow_succ, translationNumber_mul_of_commute (Commute.pow_self f n), translationNumber_pow n, Nat.cast_add_one, add_mul, one_mul] #align circle_deg1_lift.translation_number_pow CircleDeg1Lift.translationNumber_pow @[simp] theorem translationNumber_zpow (f : CircleDeg1Liftˣ) : ∀ n : ℤ, τ (f ^ n : Units _) = n * τ f \| (n : ℕ) => by simp [translationNumber_pow f n] \| -[n+1] => by simp; ring #align circle_deg1_lift.translation_number_zpow CircleDeg1Lift.translationNumber_zpow @[simp] theorem translationNumber_conj_eq (f : CircleDeg1Liftˣ) (g : CircleDeg1Lift) : τ (↑f * g * ↑f⁻¹) = τ g := (translationNumber_eq_of_semiconjBy (f.mk_semiconjBy g)).symm #align circle_deg1_lift.translation_number_conj_eq CircleDeg1Lift.translationNumber_conj_eq @[simp] theorem translationNumber_conj_eq' (f : CircleDeg1Liftˣ) (g : CircleDeg1Lift) : τ (↑f⁻¹ * g * f) = τ g := translationNumber_conj_eq f⁻¹ g #align circle_deg1_lift.translation_number_conj_eq' CircleDeg1Lift.translationNumber_conj_eq' theorem dist_pow_map_zero_mul_translationNumber_le (n : ℕ) : dist ((f ^ n) 0) (n * f.translationNumber) ≤ 1 := f.translationNumber_pow n ▸ (f ^ n).dist_map_zero_translationNumber_le #align circle_deg1_lift.dist_pow_map_zero_mul_translation_number_le CircleDeg1Lift.dist_pow_map_zero_mul_translationNumber_le theorem tendsto_translation_number₀' : Tendsto (fun n : ℕ => (f ^ (n + 1) : CircleDeg1Lift) 0 / ((n : ℝ) + 1)) atTop (𝓝 <\| τ f) := by refine tendsto_iff_dist_tendsto_zero.2 <\| squeeze_zero (fun _ => dist_nonneg) (fun n => ?_) ((tendsto_const_div_atTop_nhds_zero_nat 1).comp (tendsto_add_atTop_nat 1)) dsimp have : (0 : ℝ) < n + 1 := n.cast_add_one_pos rw [Real.dist_eq, div_sub' _ _ _ (ne_of_gt this), abs_div, ← Real.dist_eq, abs_of_pos this, Nat.cast_add_one, div_le_div_right this, ← Nat.cast_add_one] apply dist_pow_map_zero_mul_translationNumber_le #align circle_deg1_lift.tendsto_translation_number₀' CircleDeg1Lift.tendsto_translation_number₀' theorem tendsto_translation_number₀ : Tendsto (fun n : ℕ => (f ^ n) 0 / n) atTop (𝓝 <\| τ f) := (tendsto_add_atTop_iff_nat 1).1 (mod_cast f.tendsto_translation_number₀') #align circle_deg1_lift.tendsto_translation_number₀ CircleDeg1Lift.tendsto_translation_number₀ theorem tendsto_translationNumber (x : ℝ) : Tendsto (fun n : ℕ => ((f ^ n) x - x) / n) atTop (𝓝 <\| τ f) := by rw [← translationNumber_conj_eq' (translate <\| Multiplicative.ofAdd x)] refine (tendsto_translation_number₀ _).congr fun n ↦ ?_ simp [sub_eq_neg_add, Units.conj_pow'] #align circle_deg1_lift.tendsto_translation_number CircleDeg1Lift.tendsto_translationNumber theorem tendsto_translation_number' (x : ℝ) : Tendsto (fun n : ℕ => ((f ^ (n + 1) : CircleDeg1Lift) x - x) / (n + 1)) atTop (𝓝 <\| τ f) := mod_cast (tendsto_add_atTop_iff_nat 1).2 (f.tendsto_translationNumber x) #align circle_deg1_lift.tendsto_translation_number' CircleDeg1Lift.tendsto_translation_number' theorem translationNumber_mono : Monotone τ := fun f g h => le_of_tendsto_of_tendsto' f.tendsto_translation_number₀ g.tendsto_translation_number₀ fun n => by gcongr; exact pow_mono h _ _ #align circle_deg1_lift.translation_number_mono CircleDeg1Lift.translationNumber_mono theorem translationNumber_translate (x : ℝ) : τ (translate <\| Multiplicative.ofAdd x) = x := translationNumber_eq_of_tendsto₀' _ <\| by simp only [translate_iterate, translate_apply, add_zero, Nat.cast_succ, mul_div_cancel_left₀ (M₀ := ℝ) _ (Nat.cast_add_one_ne_zero _), tendsto_const_nhds] #align circle_deg1_lift.translation_number_translate CircleDeg1Lift.translationNumber_translate theorem translationNumber_le_of_le_add {z : ℝ} (hz : ∀ x, f x ≤ x + z) : τ f ≤ z := translationNumber_translate z ▸ translationNumber_mono fun x => (hz x).trans_eq (add_comm _ _) #align circle_deg1_lift.translation_number_le_of_le_add CircleDeg1Lift.translationNumber_le_of_le_add theorem le_translationNumber_of_add_le {z : ℝ} (hz : ∀ x, x + z ≤ f x) : z ≤ τ f := translationNumber_translate z ▸ translationNumber_mono fun x => (add_comm _ _).trans_le (hz x) #align circle_deg1_lift.le_translation_number_of_add_le CircleDeg1Lift.le_translationNumber_of_add_le theorem translationNumber_le_of_le_add_int {x : ℝ} {m : ℤ} (h : f x ≤ x + m) : τ f ≤ m := le_of_tendsto' (f.tendsto_translation_number' x) fun n => (div_le_iff' (n.cast_add_one_pos : (0 : ℝ) < _)).mpr <\| sub_le_iff_le_add'.2 <\| (coe_pow f (n + 1)).symm ▸ @Nat.cast_add_one ℝ _ n ▸ f.iterate_le_of_map_le_add_int h (n + 1) #align circle_deg1_lift.translation_number_le_of_le_add_int CircleDeg1Lift.translationNumber_le_of_le_add_int theorem translationNumber_le_of_le_add_nat {x : ℝ} {m : ℕ} (h : f x ≤ x + m) : τ f ≤ m := @translationNumber_le_of_le_add_int f x m h #align circle_deg1_lift.translation_number_le_of_le_add_nat CircleDeg1Lift.translationNumber_le_of_le_add_nat theorem le_translationNumber_of_add_int_le {x : ℝ} {m : ℤ} (h : x + m ≤ f x) : ↑m ≤ τ f := ge_of_tendsto' (f.tendsto_translation_number' x) fun n => (le_div_iff (n.cast_add_one_pos : (0 : ℝ) < _)).mpr <\| le_sub_iff_add_le'.2 <\| by simp only [coe_pow, mul_comm (m : ℝ), ← Nat.cast_add_one, f.le_iterate_of_add_int_le_map h] #align circle_deg1_lift.le_translation_number_of_add_int_le CircleDeg1Lift.le_translationNumber_of_add_int_le theorem le_translationNumber_of_add_nat_le {x : ℝ} {m : ℕ} (h : x + m ≤ f x) : ↑m ≤ τ f := @le_translationNumber_of_add_int_le f x m h #align circle_deg1_lift.le_translation_number_of_add_nat_le CircleDeg1Lift.le_translationNumber_of_add_nat_le theorem translationNumber_of_eq_add_int {x : ℝ} {m : ℤ} (h : f x = x + m) : τ f = m := le_antisymm (translationNumber_le_of_le_add_int f <\| le_of_eq h) (le_translationNumber_of_add_int_le f <\| le_of_eq h.symm) #align circle_deg1_lift.translation_number_of_eq_add_int CircleDeg1Lift.translationNumber_of_eq_add_int theorem floor_sub_le_translationNumber (x : ℝ) : ↑⌊f x - x⌋ ≤ τ f := le_translationNumber_of_add_int_le f <\| le_sub_iff_add_le'.1 (floor_le <\| f x - x) #align circle_deg1_lift.floor_sub_le_translation_number CircleDeg1Lift.floor_sub_le_translationNumber theorem translationNumber_le_ceil_sub (x : ℝ) : τ f ≤ ⌈f x - x⌉ := translationNumber_le_of_le_add_int f <\| sub_le_iff_le_add'.1 (le_ceil <\| f x - x) #align circle_deg1_lift.translation_number_le_ceil_sub CircleDeg1Lift.translationNumber_le_ceil_sub theorem map_lt_of_translationNumber_lt_int {n : ℤ} (h : τ f < n) (x : ℝ) : f x < x + n := not_le.1 <\| mt f.le_translationNumber_of_add_int_le <\| not_le.2 h #align circle_deg1_lift.map_lt_of_translation_number_lt_int CircleDeg1Lift.map_lt_of_translationNumber_lt_int theorem map_lt_of_translationNumber_lt_nat {n : ℕ} (h : τ f < n) (x : ℝ) : f x < x + n := @map_lt_of_translationNumber_lt_int f n h x #align circle_deg1_lift.map_lt_of_translation_number_lt_nat CircleDeg1Lift.map_lt_of_translationNumber_lt_nat theorem map_lt_add_floor_translationNumber_add_one (x : ℝ) : f x < x + ⌊τ f⌋ + 1 := by rw [add_assoc] norm_cast refine map_lt_of_translationNumber_lt_int _ ?_ _ push_cast exact lt_floor_add_one _ #align circle_deg1_lift.map_lt_add_floor_translation_number_add_one CircleDeg1Lift.map_lt_add_floor_translationNumber_add_one theorem map_lt_add_translationNumber_add_one (x : ℝ) : f x < x + τ f + 1 := calc f x < x + ⌊τ f⌋ + 1 := f.map_lt_add_floor_translationNumber_add_one x _ ≤ x + τ f + 1 := by gcongr; apply floor_le #align circle_deg1_lift.map_lt_add_translation_number_add_one CircleDeg1Lift.map_lt_add_translationNumber_add_one theorem lt_map_of_int_lt_translationNumber {n : ℤ} (h : ↑n < τ f) (x : ℝ) : x + n < f x := not_le.1 <\| mt f.translationNumber_le_of_le_add_int <\| not_le.2 h #align circle_deg1_lift.lt_map_of_int_lt_translation_number CircleDeg1Lift.lt_map_of_int_lt_translationNumber theorem lt_map_of_nat_lt_translationNumber {n : ℕ} (h : ↑n < τ f) (x : ℝ) : x + n < f x := @lt_map_of_int_lt_translationNumber f n h x #align circle_deg1_lift.lt_map_of_nat_lt_translation_number CircleDeg1Lift.lt_map_of_nat_lt_translationNumber theorem translationNumber_of_map_pow_eq_add_int {x : ℝ} {n : ℕ} {m : ℤ} (h : (f ^ n) x = x + m) (hn : 0 < n) : τ f = m / n := by have := (f ^ n).translationNumber_of_eq_add_int h rwa [translationNumber_pow, mul_comm, ← eq_div_iff] at this exact Nat.cast_ne_zero.2 (ne_of_gt hn) #align circle_deg1_lift.translation_number_of_map_pow_eq_add_int CircleDeg1Lift.translationNumber_of_map_pow_eq_add_int theorem forall_map_sub_of_Icc (P : ℝ → Prop) (h : ∀ x ∈ Icc (0 : ℝ) 1, P (f x - x)) (x : ℝ) : P (f x - x) := f.map_fract_sub_fract_eq x ▸ h _ ⟨fract_nonneg _, le_of_lt (fract_lt_one _)⟩ #align circle_deg1_lift.forall_map_sub_of_Icc CircleDeg1Lift.forall_map_sub_of_Icc	Mathlib/Dynamics/Circle/RotationNumber/TranslationNumber.lean	906	914	theorem translationNumber_lt_of_forall_lt_add (hf : Continuous f) {z : ℝ} (hz : ∀ x, f x < x + z) : τ f < z := by	obtain ⟨x, -, hx⟩ : ∃ x ∈ Icc (0 : ℝ) 1, ∀ y ∈ Icc (0 : ℝ) 1, f y - y ≤ f x - x := isCompact_Icc.exists_isMaxOn (nonempty_Icc.2 zero_le_one) (hf.sub continuous_id).continuousOn refine lt_of_le_of_lt ?_ (sub_lt_iff_lt_add'.2 <\| hz x) apply translationNumber_le_of_le_add simp only [← sub_le_iff_le_add'] exact f.forall_map_sub_of_Icc (fun a => a ≤ f x - x) hx
import Mathlib.Topology.Baire.Lemmas import Mathlib.Topology.Baire.CompleteMetrizable import Mathlib.Analysis.NormedSpace.OperatorNorm.NormedSpace import Mathlib.Analysis.NormedSpace.AffineIsometry import Mathlib.Analysis.Normed.Group.InfiniteSum #align_import analysis.normed_space.banach from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" open scoped Classical open Function Metric Set Filter Finset Topology NNReal open LinearMap (range ker) variable {𝕜 𝕜' : Type} [NontriviallyNormedField 𝕜] [NontriviallyNormedField 𝕜'] {σ : 𝕜 →+ 𝕜'} {σ' : 𝕜' →+* 𝕜} [RingHomInvPair σ σ'] [RingHomInvPair σ' σ] [RingHomIsometric σ] [RingHomIsometric σ'] variable {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] variable {F : Type} [NormedAddCommGroup F] [NormedSpace 𝕜' F] (f : E →SL[σ] F) noncomputable def ContinuousLinearEquiv.toNonlinearRightInverse (f : E ≃SL[σ] F) : ContinuousLinearMap.NonlinearRightInverse (f : E →SL[σ] F) where toFun := f.invFun nnnorm := ‖(f.symm : F →SL[σ'] E)‖₊ bound' _ := ContinuousLinearMap.le_opNorm (f.symm : F →SL[σ'] E) _ right_inv' := f.apply_symm_apply #align continuous_linear_equiv.to_nonlinear_right_inverse ContinuousLinearEquiv.toNonlinearRightInverse noncomputable instance (f : E ≃SL[σ] F) : Inhabited (ContinuousLinearMap.NonlinearRightInverse (f : E →SL[σ] F)) := ⟨f.toNonlinearRightInverse⟩ variable [CompleteSpace F] namespace ContinuousLinearMap theorem exists_approx_preimage_norm_le (surj : Surjective f) : ∃ C ≥ 0, ∀ y, ∃ x, dist (f x) y ≤ 1 / 2 * ‖y‖ ∧ ‖x‖ ≤ C * ‖y‖ := by have A : ⋃ n : ℕ, closure (f '' ball 0 n) = Set.univ := by refine Subset.antisymm (subset_univ _) fun y _ => ?_ rcases surj y with ⟨x, hx⟩ rcases exists_nat_gt ‖x‖ with ⟨n, hn⟩ refine mem_iUnion.2 ⟨n, subset_closure ?_⟩ refine (mem_image _ _ _).2 ⟨x, ⟨?_, hx⟩⟩ rwa [mem_ball, dist_eq_norm, sub_zero] have : ∃ (n : ℕ) (x : _), x ∈ interior (closure (f '' ball 0 n)) := nonempty_interior_of_iUnion_of_closed (fun n => isClosed_closure) A simp only [mem_interior_iff_mem_nhds, Metric.mem_nhds_iff] at this rcases this with ⟨n, a, ε, ⟨εpos, H⟩⟩ rcases NormedField.exists_one_lt_norm 𝕜 with ⟨c, hc⟩ refine ⟨(ε / 2)⁻¹ * ‖c‖ * 2 * n, by positivity, fun y => ?_⟩ rcases eq_or_ne y 0 with rfl \| hy · use 0 simp · have hc' : 1 < ‖σ c‖ := by simp only [RingHomIsometric.is_iso, hc] rcases rescale_to_shell hc' (half_pos εpos) hy with ⟨d, hd, ydlt, -, dinv⟩ let δ := ‖d‖ * ‖y‖ / 4 have δpos : 0 < δ := div_pos (mul_pos (norm_pos_iff.2 hd) (norm_pos_iff.2 hy)) (by norm_num) have : a + d • y ∈ ball a ε := by simp [dist_eq_norm, lt_of_le_of_lt ydlt.le (half_lt_self εpos)] rcases Metric.mem_closure_iff.1 (H this) _ δpos with ⟨z₁, z₁im, h₁⟩ rcases (mem_image _ _ _).1 z₁im with ⟨x₁, hx₁, xz₁⟩ rw [← xz₁] at h₁ rw [mem_ball, dist_eq_norm, sub_zero] at hx₁ have : a ∈ ball a ε := by simp only [mem_ball, dist_self] exact εpos rcases Metric.mem_closure_iff.1 (H this) _ δpos with ⟨z₂, z₂im, h₂⟩ rcases (mem_image _ _ _).1 z₂im with ⟨x₂, hx₂, xz₂⟩ rw [← xz₂] at h₂ rw [mem_ball, dist_eq_norm, sub_zero] at hx₂ let x := x₁ - x₂ have I : ‖f x - d • y‖ ≤ 2 * δ := calc ‖f x - d • y‖ = ‖f x₁ - (a + d • y) - (f x₂ - a)‖ := by congr 1 simp only [f.map_sub] abel _ ≤ ‖f x₁ - (a + d • y)‖ + ‖f x₂ - a‖ := norm_sub_le _ _ _ ≤ δ + δ := by rw [dist_eq_norm'] at h₁ h₂; gcongr _ = 2 * δ := (two_mul _).symm have J : ‖f (σ' d⁻¹ • x) - y‖ ≤ 1 / 2 * ‖y‖ := calc ‖f (σ' d⁻¹ • x) - y‖ = ‖d⁻¹ • f x - (d⁻¹ * d) • y‖ := by rwa [f.map_smulₛₗ _, inv_mul_cancel, one_smul, map_inv₀, map_inv₀, RingHomCompTriple.comp_apply, RingHom.id_apply] _ = ‖d⁻¹ • (f x - d • y)‖ := by rw [mul_smul, smul_sub] _ = ‖d‖⁻¹ * ‖f x - d • y‖ := by rw [norm_smul, norm_inv] _ ≤ ‖d‖⁻¹ * (2 * δ) := by gcongr _ = ‖d‖⁻¹ * ‖d‖ * ‖y‖ / 2 := by simp only [δ] ring _ = ‖y‖ / 2 := by rw [inv_mul_cancel, one_mul] simp [norm_eq_zero, hd] _ = 1 / 2 * ‖y‖ := by ring rw [← dist_eq_norm] at J have K : ‖σ' d⁻¹ • x‖ ≤ (ε / 2)⁻¹ * ‖c‖ * 2 * ↑n * ‖y‖ := calc ‖σ' d⁻¹ • x‖ = ‖d‖⁻¹ * ‖x₁ - x₂‖ := by rw [norm_smul, RingHomIsometric.is_iso, norm_inv] _ ≤ (ε / 2)⁻¹ * ‖c‖ * ‖y‖ * (n + n) := by gcongr · simpa using dinv · exact le_trans (norm_sub_le _ _) (by gcongr) _ = (ε / 2)⁻¹ * ‖c‖ * 2 * ↑n * ‖y‖ := by ring exact ⟨σ' d⁻¹ • x, J, K⟩ #align continuous_linear_map.exists_approx_preimage_norm_le ContinuousLinearMap.exists_approx_preimage_norm_le variable [CompleteSpace E]	Mathlib/Analysis/NormedSpace/Banach.lean	164	226	theorem exists_preimage_norm_le (surj : Surjective f) : ∃ C > 0, ∀ y, ∃ x, f x = y ∧ ‖x‖ ≤ C * ‖y‖ := by	obtain ⟨C, C0, hC⟩ := exists_approx_preimage_norm_le f surj /- Second step of the proof: starting from `y`, we want an exact preimage of `y`. Let `g y` be the approximate preimage of `y` given by the first step, and `h y = y - f(g y)` the part that has no preimage yet. We will iterate this process, taking the approximate preimage of `h y`, leaving only `h^2 y` without preimage yet, and so on. Let `u n` be the approximate preimage of `h^n y`. Then `u` is a converging series, and by design the sum of the series is a preimage of `y`. This uses completeness of `E`. -/ choose g hg using hC let h y := y - f (g y) have hle : ∀ y, ‖h y‖ ≤ 1 / 2 * ‖y‖ := by intro y rw [← dist_eq_norm, dist_comm] exact (hg y).1 refine ⟨2 * C + 1, by linarith, fun y => ?_⟩ have hnle : ∀ n : ℕ, ‖h^[n] y‖ ≤ (1 / 2) ^ n * ‖y‖ := by intro n induction' n with n IH · simp only [one_div, Nat.zero_eq, one_mul, iterate_zero_apply, pow_zero, le_rfl] · rw [iterate_succ'] apply le_trans (hle _) _ rw [pow_succ', mul_assoc] gcongr let u n := g (h^[n] y) have ule : ∀ n, ‖u n‖ ≤ (1 / 2) ^ n * (C * ‖y‖) := fun n ↦ by apply le_trans (hg _).2 calc C * ‖h^[n] y‖ ≤ C * ((1 / 2) ^ n * ‖y‖) := mul_le_mul_of_nonneg_left (hnle n) C0 _ = (1 / 2) ^ n * (C * ‖y‖) := by ring have sNu : Summable fun n => ‖u n‖ := by refine .of_nonneg_of_le (fun n => norm_nonneg _) ule ?_ exact Summable.mul_right _ (summable_geometric_of_lt_one (by norm_num) (by norm_num)) have su : Summable u := sNu.of_norm let x := tsum u have x_ineq : ‖x‖ ≤ (2 * C + 1) * ‖y‖ := calc ‖x‖ ≤ ∑' n, ‖u n‖ := norm_tsum_le_tsum_norm sNu _ ≤ ∑' n, (1 / 2) ^ n * (C * ‖y‖) := tsum_le_tsum ule sNu (Summable.mul_right _ summable_geometric_two) _ = (∑' n, (1 / 2) ^ n) * (C * ‖y‖) := tsum_mul_right _ = 2 * C * ‖y‖ := by rw [tsum_geometric_two, mul_assoc] _ ≤ 2 * C * ‖y‖ + ‖y‖ := le_add_of_nonneg_right (norm_nonneg y) _ = (2 * C + 1) * ‖y‖ := by ring have fsumeq : ∀ n : ℕ, f (∑ i ∈ Finset.range n, u i) = y - h^[n] y := by intro n induction' n with n IH · simp [f.map_zero] · rw [sum_range_succ, f.map_add, IH, iterate_succ_apply', sub_add] have : Tendsto (fun n => ∑ i ∈ Finset.range n, u i) atTop (𝓝 x) := su.hasSum.tendsto_sum_nat have L₁ : Tendsto (fun n => f (∑ i ∈ Finset.range n, u i)) atTop (𝓝 (f x)) := (f.continuous.tendsto _).comp this simp only [fsumeq] at L₁ have L₂ : Tendsto (fun n => y - h^[n] y) atTop (𝓝 (y - 0)) := by refine tendsto_const_nhds.sub ?_ rw [tendsto_iff_norm_sub_tendsto_zero] simp only [sub_zero] refine squeeze_zero (fun _ => norm_nonneg _) hnle ?_ rw [← zero_mul ‖y‖] refine (_root_.tendsto_pow_atTop_nhds_zero_of_lt_one ?_ ?_).mul tendsto_const_nhds <;> norm_num have feq : f x = y - 0 := tendsto_nhds_unique L₁ L₂ rw [sub_zero] at feq exact ⟨x, feq, x_ineq⟩
import Mathlib.Topology.Sets.Opens #align_import topology.sets.closeds from "leanprover-community/mathlib"@"dc6c365e751e34d100e80fe6e314c3c3e0fd2988" open Order OrderDual Set variable {ι α β : Type} [TopologicalSpace α] [TopologicalSpace β] namespace TopologicalSpace structure Closeds (α : Type) [TopologicalSpace α] where carrier : Set α closed' : IsClosed carrier #align topological_space.closeds TopologicalSpace.Closeds namespace Closeds instance : SetLike (Closeds α) α where coe := Closeds.carrier coe_injective' s t h := by cases s; cases t; congr instance : CanLift (Set α) (Closeds α) (↑) IsClosed where prf s hs := ⟨⟨s, hs⟩, rfl⟩ theorem closed (s : Closeds α) : IsClosed (s : Set α) := s.closed' #align topological_space.closeds.closed TopologicalSpace.Closeds.closed def Simps.coe (s : Closeds α) : Set α := s initialize_simps_projections Closeds (carrier → coe, as_prefix coe) @[ext] protected theorem ext {s t : Closeds α} (h : (s : Set α) = t) : s = t := SetLike.ext' h #align topological_space.closeds.ext TopologicalSpace.Closeds.ext @[simp] theorem coe_mk (s : Set α) (h) : (mk s h : Set α) = s := rfl #align topological_space.closeds.coe_mk TopologicalSpace.Closeds.coe_mk @[simps] protected def closure (s : Set α) : Closeds α := ⟨closure s, isClosed_closure⟩ #align topological_space.closeds.closure TopologicalSpace.Closeds.closure theorem gc : GaloisConnection Closeds.closure ((↑) : Closeds α → Set α) := fun _ U => ⟨subset_closure.trans, fun h => closure_minimal h U.closed⟩ #align topological_space.closeds.gc TopologicalSpace.Closeds.gc def gi : GaloisInsertion (@Closeds.closure α _) (↑) where choice s hs := ⟨s, closure_eq_iff_isClosed.1 <\| hs.antisymm subset_closure⟩ gc := gc le_l_u _ := subset_closure choice_eq _s hs := SetLike.coe_injective <\| subset_closure.antisymm hs #align topological_space.closeds.gi TopologicalSpace.Closeds.gi instance completeLattice : CompleteLattice (Closeds α) := CompleteLattice.copy (GaloisInsertion.liftCompleteLattice gi) -- le _ rfl -- top ⟨univ, isClosed_univ⟩ rfl -- bot ⟨∅, isClosed_empty⟩ (SetLike.coe_injective closure_empty.symm) -- sup (fun s t => ⟨s ∪ t, s.2.union t.2⟩) (funext fun s => funext fun t => SetLike.coe_injective (s.2.union t.2).closure_eq.symm) -- inf (fun s t => ⟨s ∩ t, s.2.inter t.2⟩) rfl -- sSup _ rfl -- sInf (fun S => ⟨⋂ s ∈ S, ↑s, isClosed_biInter fun s _ => s.2⟩) (funext fun _ => SetLike.coe_injective sInf_image.symm) instance : Inhabited (Closeds α) := ⟨⊥⟩ @[simp, norm_cast]	Mathlib/Topology/Sets/Closeds.lean	110	111	theorem coe_sup (s t : Closeds α) : (↑(s ⊔ t) : Set α) = ↑s ∪ ↑t := by	rfl
import Mathlib.LinearAlgebra.Finsupp import Mathlib.RingTheory.Ideal.Over import Mathlib.RingTheory.Ideal.Prod import Mathlib.RingTheory.Ideal.MinimalPrime import Mathlib.RingTheory.Localization.Away.Basic import Mathlib.RingTheory.Nilpotent.Lemmas import Mathlib.Topology.Sets.Closeds import Mathlib.Topology.Sober #align_import algebraic_geometry.prime_spectrum.basic from "leanprover-community/mathlib"@"a7c017d750512a352b623b1824d75da5998457d0" noncomputable section open scoped Classical universe u v variable (R : Type u) (S : Type v) @[ext] structure PrimeSpectrum [CommSemiring R] where asIdeal : Ideal R IsPrime : asIdeal.IsPrime #align prime_spectrum PrimeSpectrum attribute [instance] PrimeSpectrum.IsPrime namespace PrimeSpectrum section CommSemiRing variable [CommSemiring R] [CommSemiring S] variable {R S} instance [Nontrivial R] : Nonempty <\| PrimeSpectrum R := let ⟨I, hI⟩ := Ideal.exists_maximal R ⟨⟨I, hI.isPrime⟩⟩ instance [Subsingleton R] : IsEmpty (PrimeSpectrum R) := ⟨fun x ↦ x.IsPrime.ne_top <\| SetLike.ext' <\| Subsingleton.eq_univ_of_nonempty x.asIdeal.nonempty⟩ #noalign prime_spectrum.punit variable (R S) @[simp] def primeSpectrumProdOfSum : Sum (PrimeSpectrum R) (PrimeSpectrum S) → PrimeSpectrum (R × S) \| Sum.inl ⟨I, _⟩ => ⟨Ideal.prod I ⊤, Ideal.isPrime_ideal_prod_top⟩ \| Sum.inr ⟨J, _⟩ => ⟨Ideal.prod ⊤ J, Ideal.isPrime_ideal_prod_top'⟩ #align prime_spectrum.prime_spectrum_prod_of_sum PrimeSpectrum.primeSpectrumProdOfSum noncomputable def primeSpectrumProd : PrimeSpectrum (R × S) ≃ Sum (PrimeSpectrum R) (PrimeSpectrum S) := Equiv.symm <\| Equiv.ofBijective (primeSpectrumProdOfSum R S) (by constructor · rintro (⟨I, hI⟩ \| ⟨J, hJ⟩) (⟨I', hI'⟩ \| ⟨J', hJ'⟩) h <;> simp only [mk.injEq, Ideal.prod.ext_iff, primeSpectrumProdOfSum] at h · simp only [h] · exact False.elim (hI.ne_top h.left) · exact False.elim (hJ.ne_top h.right) · simp only [h] · rintro ⟨I, hI⟩ rcases (Ideal.ideal_prod_prime I).mp hI with (⟨p, ⟨hp, rfl⟩⟩ \| ⟨p, ⟨hp, rfl⟩⟩) · exact ⟨Sum.inl ⟨p, hp⟩, rfl⟩ · exact ⟨Sum.inr ⟨p, hp⟩, rfl⟩) #align prime_spectrum.prime_spectrum_prod PrimeSpectrum.primeSpectrumProd variable {R S} @[simp] theorem primeSpectrumProd_symm_inl_asIdeal (x : PrimeSpectrum R) : ((primeSpectrumProd R S).symm <\| Sum.inl x).asIdeal = Ideal.prod x.asIdeal ⊤ := by cases x rfl #align prime_spectrum.prime_spectrum_prod_symm_inl_as_ideal PrimeSpectrum.primeSpectrumProd_symm_inl_asIdeal @[simp] theorem primeSpectrumProd_symm_inr_asIdeal (x : PrimeSpectrum S) : ((primeSpectrumProd R S).symm <\| Sum.inr x).asIdeal = Ideal.prod ⊤ x.asIdeal := by cases x rfl #align prime_spectrum.prime_spectrum_prod_symm_inr_as_ideal PrimeSpectrum.primeSpectrumProd_symm_inr_asIdeal def zeroLocus (s : Set R) : Set (PrimeSpectrum R) := { x \| s ⊆ x.asIdeal } #align prime_spectrum.zero_locus PrimeSpectrum.zeroLocus @[simp] theorem mem_zeroLocus (x : PrimeSpectrum R) (s : Set R) : x ∈ zeroLocus s ↔ s ⊆ x.asIdeal := Iff.rfl #align prime_spectrum.mem_zero_locus PrimeSpectrum.mem_zeroLocus @[simp] theorem zeroLocus_span (s : Set R) : zeroLocus (Ideal.span s : Set R) = zeroLocus s := by ext x exact (Submodule.gi R R).gc s x.asIdeal #align prime_spectrum.zero_locus_span PrimeSpectrum.zeroLocus_span def vanishingIdeal (t : Set (PrimeSpectrum R)) : Ideal R := ⨅ (x : PrimeSpectrum R) (_ : x ∈ t), x.asIdeal #align prime_spectrum.vanishing_ideal PrimeSpectrum.vanishingIdeal theorem coe_vanishingIdeal (t : Set (PrimeSpectrum R)) : (vanishingIdeal t : Set R) = { f : R \| ∀ x : PrimeSpectrum R, x ∈ t → f ∈ x.asIdeal } := by ext f rw [vanishingIdeal, SetLike.mem_coe, Submodule.mem_iInf] apply forall_congr'; intro x rw [Submodule.mem_iInf] #align prime_spectrum.coe_vanishing_ideal PrimeSpectrum.coe_vanishingIdeal theorem mem_vanishingIdeal (t : Set (PrimeSpectrum R)) (f : R) : f ∈ vanishingIdeal t ↔ ∀ x : PrimeSpectrum R, x ∈ t → f ∈ x.asIdeal := by rw [← SetLike.mem_coe, coe_vanishingIdeal, Set.mem_setOf_eq] #align prime_spectrum.mem_vanishing_ideal PrimeSpectrum.mem_vanishingIdeal @[simp] theorem vanishingIdeal_singleton (x : PrimeSpectrum R) : vanishingIdeal ({x} : Set (PrimeSpectrum R)) = x.asIdeal := by simp [vanishingIdeal] #align prime_spectrum.vanishing_ideal_singleton PrimeSpectrum.vanishingIdeal_singleton theorem subset_zeroLocus_iff_le_vanishingIdeal (t : Set (PrimeSpectrum R)) (I : Ideal R) : t ⊆ zeroLocus I ↔ I ≤ vanishingIdeal t := ⟨fun h _ k => (mem_vanishingIdeal _ _).mpr fun _ j => (mem_zeroLocus _ _).mpr (h j) k, fun h => fun x j => (mem_zeroLocus _ _).mpr (le_trans h fun _ h => ((mem_vanishingIdeal _ _).mp h) x j)⟩ #align prime_spectrum.subset_zero_locus_iff_le_vanishing_ideal PrimeSpectrum.subset_zeroLocus_iff_le_vanishingIdeal theorem subset_vanishingIdeal_zeroLocus (s : Set R) : s ⊆ vanishingIdeal (zeroLocus s) := (gc_set R).le_u_l s #align prime_spectrum.subset_vanishing_ideal_zero_locus PrimeSpectrum.subset_vanishingIdeal_zeroLocus theorem le_vanishingIdeal_zeroLocus (I : Ideal R) : I ≤ vanishingIdeal (zeroLocus I) := (gc R).le_u_l I #align prime_spectrum.le_vanishing_ideal_zero_locus PrimeSpectrum.le_vanishingIdeal_zeroLocus @[simp] theorem vanishingIdeal_zeroLocus_eq_radical (I : Ideal R) : vanishingIdeal (zeroLocus (I : Set R)) = I.radical := Ideal.ext fun f => by rw [mem_vanishingIdeal, Ideal.radical_eq_sInf, Submodule.mem_sInf] exact ⟨fun h x hx => h ⟨x, hx.2⟩ hx.1, fun h x hx => h x.1 ⟨hx, x.2⟩⟩ #align prime_spectrum.vanishing_ideal_zero_locus_eq_radical PrimeSpectrum.vanishingIdeal_zeroLocus_eq_radical @[simp] theorem zeroLocus_radical (I : Ideal R) : zeroLocus (I.radical : Set R) = zeroLocus I := vanishingIdeal_zeroLocus_eq_radical I ▸ (gc R).l_u_l_eq_l I #align prime_spectrum.zero_locus_radical PrimeSpectrum.zeroLocus_radical theorem subset_zeroLocus_vanishingIdeal (t : Set (PrimeSpectrum R)) : t ⊆ zeroLocus (vanishingIdeal t) := (gc R).l_u_le t #align prime_spectrum.subset_zero_locus_vanishing_ideal PrimeSpectrum.subset_zeroLocus_vanishingIdeal theorem zeroLocus_anti_mono {s t : Set R} (h : s ⊆ t) : zeroLocus t ⊆ zeroLocus s := (gc_set R).monotone_l h #align prime_spectrum.zero_locus_anti_mono PrimeSpectrum.zeroLocus_anti_mono theorem zeroLocus_anti_mono_ideal {s t : Ideal R} (h : s ≤ t) : zeroLocus (t : Set R) ⊆ zeroLocus (s : Set R) := (gc R).monotone_l h #align prime_spectrum.zero_locus_anti_mono_ideal PrimeSpectrum.zeroLocus_anti_mono_ideal theorem vanishingIdeal_anti_mono {s t : Set (PrimeSpectrum R)} (h : s ⊆ t) : vanishingIdeal t ≤ vanishingIdeal s := (gc R).monotone_u h #align prime_spectrum.vanishing_ideal_anti_mono PrimeSpectrum.vanishingIdeal_anti_mono theorem zeroLocus_subset_zeroLocus_iff (I J : Ideal R) : zeroLocus (I : Set R) ⊆ zeroLocus (J : Set R) ↔ J ≤ I.radical := by rw [subset_zeroLocus_iff_le_vanishingIdeal, vanishingIdeal_zeroLocus_eq_radical] #align prime_spectrum.zero_locus_subset_zero_locus_iff PrimeSpectrum.zeroLocus_subset_zeroLocus_iff theorem zeroLocus_subset_zeroLocus_singleton_iff (f g : R) : zeroLocus ({f} : Set R) ⊆ zeroLocus {g} ↔ g ∈ (Ideal.span ({f} : Set R)).radical := by rw [← zeroLocus_span {f}, ← zeroLocus_span {g}, zeroLocus_subset_zeroLocus_iff, Ideal.span_le, Set.singleton_subset_iff, SetLike.mem_coe] #align prime_spectrum.zero_locus_subset_zero_locus_singleton_iff PrimeSpectrum.zeroLocus_subset_zeroLocus_singleton_iff theorem zeroLocus_bot : zeroLocus ((⊥ : Ideal R) : Set R) = Set.univ := (gc R).l_bot #align prime_spectrum.zero_locus_bot PrimeSpectrum.zeroLocus_bot @[simp] theorem zeroLocus_singleton_zero : zeroLocus ({0} : Set R) = Set.univ := zeroLocus_bot #align prime_spectrum.zero_locus_singleton_zero PrimeSpectrum.zeroLocus_singleton_zero @[simp] theorem zeroLocus_empty : zeroLocus (∅ : Set R) = Set.univ := (gc_set R).l_bot #align prime_spectrum.zero_locus_empty PrimeSpectrum.zeroLocus_empty @[simp] theorem vanishingIdeal_univ : vanishingIdeal (∅ : Set (PrimeSpectrum R)) = ⊤ := by simpa using (gc R).u_top #align prime_spectrum.vanishing_ideal_univ PrimeSpectrum.vanishingIdeal_univ theorem zeroLocus_empty_of_one_mem {s : Set R} (h : (1 : R) ∈ s) : zeroLocus s = ∅ := by rw [Set.eq_empty_iff_forall_not_mem] intro x hx rw [mem_zeroLocus] at hx have x_prime : x.asIdeal.IsPrime := by infer_instance have eq_top : x.asIdeal = ⊤ := by rw [Ideal.eq_top_iff_one] exact hx h apply x_prime.ne_top eq_top #align prime_spectrum.zero_locus_empty_of_one_mem PrimeSpectrum.zeroLocus_empty_of_one_mem @[simp] theorem zeroLocus_singleton_one : zeroLocus ({1} : Set R) = ∅ := zeroLocus_empty_of_one_mem (Set.mem_singleton (1 : R)) #align prime_spectrum.zero_locus_singleton_one PrimeSpectrum.zeroLocus_singleton_one theorem zeroLocus_empty_iff_eq_top {I : Ideal R} : zeroLocus (I : Set R) = ∅ ↔ I = ⊤ := by constructor · contrapose! intro h rcases Ideal.exists_le_maximal I h with ⟨M, hM, hIM⟩ exact ⟨⟨M, hM.isPrime⟩, hIM⟩ · rintro rfl apply zeroLocus_empty_of_one_mem trivial #align prime_spectrum.zero_locus_empty_iff_eq_top PrimeSpectrum.zeroLocus_empty_iff_eq_top @[simp] theorem zeroLocus_univ : zeroLocus (Set.univ : Set R) = ∅ := zeroLocus_empty_of_one_mem (Set.mem_univ 1) #align prime_spectrum.zero_locus_univ PrimeSpectrum.zeroLocus_univ theorem vanishingIdeal_eq_top_iff {s : Set (PrimeSpectrum R)} : vanishingIdeal s = ⊤ ↔ s = ∅ := by rw [← top_le_iff, ← subset_zeroLocus_iff_le_vanishingIdeal, Submodule.top_coe, zeroLocus_univ, Set.subset_empty_iff] #align prime_spectrum.vanishing_ideal_eq_top_iff PrimeSpectrum.vanishingIdeal_eq_top_iff theorem zeroLocus_sup (I J : Ideal R) : zeroLocus ((I ⊔ J : Ideal R) : Set R) = zeroLocus I ∩ zeroLocus J := (gc R).l_sup #align prime_spectrum.zero_locus_sup PrimeSpectrum.zeroLocus_sup theorem zeroLocus_union (s s' : Set R) : zeroLocus (s ∪ s') = zeroLocus s ∩ zeroLocus s' := (gc_set R).l_sup #align prime_spectrum.zero_locus_union PrimeSpectrum.zeroLocus_union theorem vanishingIdeal_union (t t' : Set (PrimeSpectrum R)) : vanishingIdeal (t ∪ t') = vanishingIdeal t ⊓ vanishingIdeal t' := (gc R).u_inf #align prime_spectrum.vanishing_ideal_union PrimeSpectrum.vanishingIdeal_union theorem zeroLocus_iSup {ι : Sort} (I : ι → Ideal R) : zeroLocus ((⨆ i, I i : Ideal R) : Set R) = ⋂ i, zeroLocus (I i) := (gc R).l_iSup #align prime_spectrum.zero_locus_supr PrimeSpectrum.zeroLocus_iSup theorem zeroLocus_iUnion {ι : Sort} (s : ι → Set R) : zeroLocus (⋃ i, s i) = ⋂ i, zeroLocus (s i) := (gc_set R).l_iSup #align prime_spectrum.zero_locus_Union PrimeSpectrum.zeroLocus_iUnion theorem zeroLocus_bUnion (s : Set (Set R)) : zeroLocus (⋃ s' ∈ s, s' : Set R) = ⋂ s' ∈ s, zeroLocus s' := by simp only [zeroLocus_iUnion] #align prime_spectrum.zero_locus_bUnion PrimeSpectrum.zeroLocus_bUnion theorem vanishingIdeal_iUnion {ι : Sort} (t : ι → Set (PrimeSpectrum R)) : vanishingIdeal (⋃ i, t i) = ⨅ i, vanishingIdeal (t i) := (gc R).u_iInf #align prime_spectrum.vanishing_ideal_Union PrimeSpectrum.vanishingIdeal_iUnion theorem zeroLocus_inf (I J : Ideal R) : zeroLocus ((I ⊓ J : Ideal R) : Set R) = zeroLocus I ∪ zeroLocus J := Set.ext fun x => x.2.inf_le #align prime_spectrum.zero_locus_inf PrimeSpectrum.zeroLocus_inf theorem union_zeroLocus (s s' : Set R) : zeroLocus s ∪ zeroLocus s' = zeroLocus (Ideal.span s ⊓ Ideal.span s' : Ideal R) := by rw [zeroLocus_inf] simp #align prime_spectrum.union_zero_locus PrimeSpectrum.union_zeroLocus theorem zeroLocus_mul (I J : Ideal R) : zeroLocus ((I J : Ideal R) : Set R) = zeroLocus I ∪ zeroLocus J := Set.ext fun x => x.2.mul_le #align prime_spectrum.zero_locus_mul PrimeSpectrum.zeroLocus_mul theorem zeroLocus_singleton_mul (f g : R) : zeroLocus ({f * g} : Set R) = zeroLocus {f} ∪ zeroLocus {g} := Set.ext fun x => by simpa using x.2.mul_mem_iff_mem_or_mem #align prime_spectrum.zero_locus_singleton_mul PrimeSpectrum.zeroLocus_singleton_mul @[simp] theorem zeroLocus_pow (I : Ideal R) {n : ℕ} (hn : n ≠ 0) : zeroLocus ((I ^ n : Ideal R) : Set R) = zeroLocus I := zeroLocus_radical (I ^ n) ▸ (I.radical_pow hn).symm ▸ zeroLocus_radical I #align prime_spectrum.zero_locus_pow PrimeSpectrum.zeroLocus_pow @[simp] theorem zeroLocus_singleton_pow (f : R) (n : ℕ) (hn : 0 < n) : zeroLocus ({f ^ n} : Set R) = zeroLocus {f} := Set.ext fun x => by simpa using x.2.pow_mem_iff_mem n hn #align prime_spectrum.zero_locus_singleton_pow PrimeSpectrum.zeroLocus_singleton_pow theorem sup_vanishingIdeal_le (t t' : Set (PrimeSpectrum R)) : vanishingIdeal t ⊔ vanishingIdeal t' ≤ vanishingIdeal (t ∩ t') := by intro r rw [Submodule.mem_sup, mem_vanishingIdeal] rintro ⟨f, hf, g, hg, rfl⟩ x ⟨hxt, hxt'⟩ rw [mem_vanishingIdeal] at hf hg apply Submodule.add_mem <;> solve_by_elim #align prime_spectrum.sup_vanishing_ideal_le PrimeSpectrum.sup_vanishingIdeal_le theorem mem_compl_zeroLocus_iff_not_mem {f : R} {I : PrimeSpectrum R} : I ∈ (zeroLocus {f} : Set (PrimeSpectrum R))ᶜ ↔ f ∉ I.asIdeal := by rw [Set.mem_compl_iff, mem_zeroLocus, Set.singleton_subset_iff]; rfl #align prime_spectrum.mem_compl_zero_locus_iff_not_mem PrimeSpectrum.mem_compl_zeroLocus_iff_not_mem instance zariskiTopology : TopologicalSpace (PrimeSpectrum R) := TopologicalSpace.ofClosed (Set.range PrimeSpectrum.zeroLocus) ⟨Set.univ, by simp⟩ (by intro Zs h rw [Set.sInter_eq_iInter] choose f hf using fun i : Zs => h i.prop simp only [← hf] exact ⟨_, zeroLocus_iUnion _⟩) (by rintro _ ⟨s, rfl⟩ _ ⟨t, rfl⟩ exact ⟨_, (union_zeroLocus s t).symm⟩) #align prime_spectrum.zariski_topology PrimeSpectrum.zariskiTopology theorem isOpen_iff (U : Set (PrimeSpectrum R)) : IsOpen U ↔ ∃ s, Uᶜ = zeroLocus s := by simp only [@eq_comm _ Uᶜ]; rfl #align prime_spectrum.is_open_iff PrimeSpectrum.isOpen_iff theorem isClosed_iff_zeroLocus (Z : Set (PrimeSpectrum R)) : IsClosed Z ↔ ∃ s, Z = zeroLocus s := by rw [← isOpen_compl_iff, isOpen_iff, compl_compl] #align prime_spectrum.is_closed_iff_zero_locus PrimeSpectrum.isClosed_iff_zeroLocus theorem isClosed_iff_zeroLocus_ideal (Z : Set (PrimeSpectrum R)) : IsClosed Z ↔ ∃ I : Ideal R, Z = zeroLocus I := (isClosed_iff_zeroLocus _).trans ⟨fun ⟨s, hs⟩ => ⟨_, (zeroLocus_span s).substr hs⟩, fun ⟨I, hI⟩ => ⟨I, hI⟩⟩ #align prime_spectrum.is_closed_iff_zero_locus_ideal PrimeSpectrum.isClosed_iff_zeroLocus_ideal theorem isClosed_iff_zeroLocus_radical_ideal (Z : Set (PrimeSpectrum R)) : IsClosed Z ↔ ∃ I : Ideal R, I.IsRadical ∧ Z = zeroLocus I := (isClosed_iff_zeroLocus_ideal _).trans ⟨fun ⟨I, hI⟩ => ⟨_, I.radical_isRadical, (zeroLocus_radical I).substr hI⟩, fun ⟨I, _, hI⟩ => ⟨I, hI⟩⟩ #align prime_spectrum.is_closed_iff_zero_locus_radical_ideal PrimeSpectrum.isClosed_iff_zeroLocus_radical_ideal theorem isClosed_zeroLocus (s : Set R) : IsClosed (zeroLocus s) := by rw [isClosed_iff_zeroLocus] exact ⟨s, rfl⟩ #align prime_spectrum.is_closed_zero_locus PrimeSpectrum.isClosed_zeroLocus theorem zeroLocus_vanishingIdeal_eq_closure (t : Set (PrimeSpectrum R)) : zeroLocus (vanishingIdeal t : Set R) = closure t := by rcases isClosed_iff_zeroLocus (closure t) \|>.mp isClosed_closure with ⟨I, hI⟩ rw [subset_antisymm_iff, (isClosed_zeroLocus _).closure_subset_iff, hI, subset_zeroLocus_iff_subset_vanishingIdeal, (gc R).u_l_u_eq_u, ← subset_zeroLocus_iff_subset_vanishingIdeal, ← hI] exact ⟨subset_closure, subset_zeroLocus_vanishingIdeal t⟩ #align prime_spectrum.zero_locus_vanishing_ideal_eq_closure PrimeSpectrum.zeroLocus_vanishingIdeal_eq_closure theorem vanishingIdeal_closure (t : Set (PrimeSpectrum R)) : vanishingIdeal (closure t) = vanishingIdeal t := zeroLocus_vanishingIdeal_eq_closure t ▸ (gc R).u_l_u_eq_u t #align prime_spectrum.vanishing_ideal_closure PrimeSpectrum.vanishingIdeal_closure theorem closure_singleton (x) : closure ({x} : Set (PrimeSpectrum R)) = zeroLocus x.asIdeal := by rw [← zeroLocus_vanishingIdeal_eq_closure, vanishingIdeal_singleton] #align prime_spectrum.closure_singleton PrimeSpectrum.closure_singleton theorem isClosed_singleton_iff_isMaximal (x : PrimeSpectrum R) : IsClosed ({x} : Set (PrimeSpectrum R)) ↔ x.asIdeal.IsMaximal := by rw [← closure_subset_iff_isClosed, ← zeroLocus_vanishingIdeal_eq_closure, vanishingIdeal_singleton] constructor <;> intro H · rcases x.asIdeal.exists_le_maximal x.2.1 with ⟨m, hm, hxm⟩ exact (congr_arg asIdeal (@H ⟨m, hm.isPrime⟩ hxm)) ▸ hm · exact fun p hp ↦ PrimeSpectrum.ext _ _ (H.eq_of_le p.2.1 hp).symm #align prime_spectrum.is_closed_singleton_iff_is_maximal PrimeSpectrum.isClosed_singleton_iff_isMaximal theorem isRadical_vanishingIdeal (s : Set (PrimeSpectrum R)) : (vanishingIdeal s).IsRadical := by rw [← vanishingIdeal_closure, ← zeroLocus_vanishingIdeal_eq_closure, vanishingIdeal_zeroLocus_eq_radical] apply Ideal.radical_isRadical #align prime_spectrum.is_radical_vanishing_ideal PrimeSpectrum.isRadical_vanishingIdeal theorem vanishingIdeal_anti_mono_iff {s t : Set (PrimeSpectrum R)} (ht : IsClosed t) : s ⊆ t ↔ vanishingIdeal t ≤ vanishingIdeal s := ⟨vanishingIdeal_anti_mono, fun h => by rw [← ht.closure_subset_iff, ← ht.closure_eq] convert ← zeroLocus_anti_mono_ideal h <;> apply zeroLocus_vanishingIdeal_eq_closure⟩ #align prime_spectrum.vanishing_ideal_anti_mono_iff PrimeSpectrum.vanishingIdeal_anti_mono_iff theorem vanishingIdeal_strict_anti_mono_iff {s t : Set (PrimeSpectrum R)} (hs : IsClosed s) (ht : IsClosed t) : s ⊂ t ↔ vanishingIdeal t < vanishingIdeal s := by rw [Set.ssubset_def, vanishingIdeal_anti_mono_iff hs, vanishingIdeal_anti_mono_iff ht, lt_iff_le_not_le] #align prime_spectrum.vanishing_ideal_strict_anti_mono_iff PrimeSpectrum.vanishingIdeal_strict_anti_mono_iff def closedsEmbedding (R : Type) [CommSemiring R] : (TopologicalSpace.Closeds <\| PrimeSpectrum R)ᵒᵈ ↪o Ideal R := OrderEmbedding.ofMapLEIff (fun s => vanishingIdeal ↑(OrderDual.ofDual s)) fun s _ => (vanishingIdeal_anti_mono_iff s.2).symm #align prime_spectrum.closeds_embedding PrimeSpectrum.closedsEmbedding theorem t1Space_iff_isField [IsDomain R] : T1Space (PrimeSpectrum R) ↔ IsField R := by refine ⟨?_, fun h => ?_⟩ · intro h have hbot : Ideal.IsPrime (⊥ : Ideal R) := Ideal.bot_prime exact Classical.not_not.1 (mt (Ring.ne_bot_of_isMaximal_of_not_isField <\| (isClosed_singleton_iff_isMaximal _).1 (T1Space.t1 ⟨⊥, hbot⟩)) (by aesop)) · refine ⟨fun x => (isClosed_singleton_iff_isMaximal x).2 ?_⟩ by_cases hx : x.asIdeal = ⊥ · letI := h.toSemifield exact hx.symm ▸ Ideal.bot_isMaximal · exact absurd h (Ring.not_isField_iff_exists_prime.2 ⟨x.asIdeal, ⟨hx, x.2⟩⟩) #align prime_spectrum.t1_space_iff_is_field PrimeSpectrum.t1Space_iff_isField local notation "Z(" a ")" => zeroLocus (a : Set R) theorem isIrreducible_zeroLocus_iff_of_radical (I : Ideal R) (hI : I.IsRadical) : IsIrreducible (zeroLocus (I : Set R)) ↔ I.IsPrime := by rw [Ideal.isPrime_iff, IsIrreducible] apply and_congr · rw [Set.nonempty_iff_ne_empty, Ne, zeroLocus_empty_iff_eq_top] · trans ∀ x y : Ideal R, Z(I) ⊆ Z(x) ∪ Z(y) → Z(I) ⊆ Z(x) ∨ Z(I) ⊆ Z(y) · simp_rw [isPreirreducible_iff_closed_union_closed, isClosed_iff_zeroLocus_ideal] constructor · rintro h x y exact h _ _ ⟨x, rfl⟩ ⟨y, rfl⟩ · rintro h _ _ ⟨x, rfl⟩ ⟨y, rfl⟩ exact h x y · simp_rw [← zeroLocus_inf, subset_zeroLocus_iff_le_vanishingIdeal, vanishingIdeal_zeroLocus_eq_radical, hI.radical] constructor · simp_rw [← SetLike.mem_coe, ← Set.singleton_subset_iff, ← Ideal.span_le, ← Ideal.span_singleton_mul_span_singleton] refine fun h x y h' => h _ _ ?_ rw [← hI.radical_le_iff] at h' ⊢ simpa only [Ideal.radical_inf, Ideal.radical_mul] using h' · simp_rw [or_iff_not_imp_left, SetLike.not_le_iff_exists] rintro h s t h' ⟨x, hx, hx'⟩ y hy exact h (h' ⟨Ideal.mul_mem_right _ _ hx, Ideal.mul_mem_left _ _ hy⟩) hx' #align prime_spectrum.is_irreducible_zero_locus_iff_of_radical PrimeSpectrum.isIrreducible_zeroLocus_iff_of_radical theorem isIrreducible_zeroLocus_iff (I : Ideal R) : IsIrreducible (zeroLocus (I : Set R)) ↔ I.radical.IsPrime := zeroLocus_radical I ▸ isIrreducible_zeroLocus_iff_of_radical _ I.radical_isRadical #align prime_spectrum.is_irreducible_zero_locus_iff PrimeSpectrum.isIrreducible_zeroLocus_iff theorem isIrreducible_iff_vanishingIdeal_isPrime {s : Set (PrimeSpectrum R)} : IsIrreducible s ↔ (vanishingIdeal s).IsPrime := by rw [← isIrreducible_iff_closure, ← zeroLocus_vanishingIdeal_eq_closure, isIrreducible_zeroLocus_iff_of_radical _ (isRadical_vanishingIdeal s)] #align prime_spectrum.is_irreducible_iff_vanishing_ideal_is_prime PrimeSpectrum.isIrreducible_iff_vanishingIdeal_isPrime lemma vanishingIdeal_isIrreducible : vanishingIdeal (R := R) '' {s \| IsIrreducible s} = {P \| P.IsPrime} := Set.ext fun I ↦ ⟨fun ⟨_, hs, e⟩ ↦ e ▸ isIrreducible_iff_vanishingIdeal_isPrime.mp hs, fun h ↦ ⟨zeroLocus I, (isIrreducible_zeroLocus_iff_of_radical _ h.isRadical).mpr h, (vanishingIdeal_zeroLocus_eq_radical I).trans h.radical⟩⟩ lemma vanishingIdeal_isClosed_isIrreducible : vanishingIdeal (R := R) '' {s \| IsClosed s ∧ IsIrreducible s} = {P \| P.IsPrime} := by refine (subset_antisymm ?_ ?_).trans vanishingIdeal_isIrreducible · exact Set.image_subset _ fun _ ↦ And.right rintro _ ⟨s, hs, rfl⟩ exact ⟨closure s, ⟨isClosed_closure, hs.closure⟩, vanishingIdeal_closure s⟩ instance irreducibleSpace [IsDomain R] : IrreducibleSpace (PrimeSpectrum R) := by rw [irreducibleSpace_def, Set.top_eq_univ, ← zeroLocus_bot, isIrreducible_zeroLocus_iff] simpa using Ideal.bot_prime instance quasiSober : QuasiSober (PrimeSpectrum R) := ⟨fun {S} h₁ h₂ => ⟨⟨_, isIrreducible_iff_vanishingIdeal_isPrime.1 h₁⟩, by rw [IsGenericPoint, closure_singleton, zeroLocus_vanishingIdeal_eq_closure, h₂.closure_eq]⟩⟩ instance compactSpace : CompactSpace (PrimeSpectrum R) := by refine compactSpace_of_finite_subfamily_closed fun S S_closed S_empty ↦ ?_ choose I hI using fun i ↦ (isClosed_iff_zeroLocus_ideal (S i)).mp (S_closed i) simp_rw [hI, ← zeroLocus_iSup, zeroLocus_empty_iff_eq_top, ← top_le_iff] at S_empty ⊢ exact Ideal.isCompactElement_top.exists_finset_of_le_iSup _ _ S_empty section CommSemiRing variable [CommSemiring R] [CommSemiring S] variable {R S} section BasicOpen def basicOpen (r : R) : TopologicalSpace.Opens (PrimeSpectrum R) where carrier := { x \| r ∉ x.asIdeal } is_open' := ⟨{r}, Set.ext fun _ => Set.singleton_subset_iff.trans <\| Classical.not_not.symm⟩ #align prime_spectrum.basic_open PrimeSpectrum.basicOpen @[simp] theorem mem_basicOpen (f : R) (x : PrimeSpectrum R) : x ∈ basicOpen f ↔ f ∉ x.asIdeal := Iff.rfl #align prime_spectrum.mem_basic_open PrimeSpectrum.mem_basicOpen theorem isOpen_basicOpen {a : R} : IsOpen (basicOpen a : Set (PrimeSpectrum R)) := (basicOpen a).isOpen #align prime_spectrum.is_open_basic_open PrimeSpectrum.isOpen_basicOpen @[simp] theorem basicOpen_eq_zeroLocus_compl (r : R) : (basicOpen r : Set (PrimeSpectrum R)) = (zeroLocus {r})ᶜ := Set.ext fun x => by simp only [SetLike.mem_coe, mem_basicOpen, Set.mem_compl_iff, mem_zeroLocus, Set.singleton_subset_iff] #align prime_spectrum.basic_open_eq_zero_locus_compl PrimeSpectrum.basicOpen_eq_zeroLocus_compl @[simp] theorem basicOpen_one : basicOpen (1 : R) = ⊤ := TopologicalSpace.Opens.ext <\| by simp #align prime_spectrum.basic_open_one PrimeSpectrum.basicOpen_one @[simp] theorem basicOpen_zero : basicOpen (0 : R) = ⊥ := TopologicalSpace.Opens.ext <\| by simp #align prime_spectrum.basic_open_zero PrimeSpectrum.basicOpen_zero theorem basicOpen_le_basicOpen_iff (f g : R) : basicOpen f ≤ basicOpen g ↔ f ∈ (Ideal.span ({g} : Set R)).radical := by rw [← SetLike.coe_subset_coe, basicOpen_eq_zeroLocus_compl, basicOpen_eq_zeroLocus_compl, Set.compl_subset_compl, zeroLocus_subset_zeroLocus_singleton_iff] #align prime_spectrum.basic_open_le_basic_open_iff PrimeSpectrum.basicOpen_le_basicOpen_iff theorem basicOpen_mul (f g : R) : basicOpen (f g) = basicOpen f ⊓ basicOpen g := TopologicalSpace.Opens.ext <\| by simp [zeroLocus_singleton_mul] #align prime_spectrum.basic_open_mul PrimeSpectrum.basicOpen_mul theorem basicOpen_mul_le_left (f g : R) : basicOpen (f * g) ≤ basicOpen f := by rw [basicOpen_mul f g] exact inf_le_left #align prime_spectrum.basic_open_mul_le_left PrimeSpectrum.basicOpen_mul_le_left theorem basicOpen_mul_le_right (f g : R) : basicOpen (f * g) ≤ basicOpen g := by rw [basicOpen_mul f g] exact inf_le_right #align prime_spectrum.basic_open_mul_le_right PrimeSpectrum.basicOpen_mul_le_right @[simp] theorem basicOpen_pow (f : R) (n : ℕ) (hn : 0 < n) : basicOpen (f ^ n) = basicOpen f := TopologicalSpace.Opens.ext <\| by simpa using zeroLocus_singleton_pow f n hn #align prime_spectrum.basic_open_pow PrimeSpectrum.basicOpen_pow	Mathlib/AlgebraicGeometry/PrimeSpectrum/Basic.lean	833	844	theorem isTopologicalBasis_basic_opens : TopologicalSpace.IsTopologicalBasis (Set.range fun r : R => (basicOpen r : Set (PrimeSpectrum R))) := by	apply TopologicalSpace.isTopologicalBasis_of_isOpen_of_nhds · rintro _ ⟨r, rfl⟩ exact isOpen_basicOpen · rintro p U hp ⟨s, hs⟩ rw [← compl_compl U, Set.mem_compl_iff, ← hs, mem_zeroLocus, Set.not_subset] at hp obtain ⟨f, hfs, hfp⟩ := hp refine ⟨basicOpen f, ⟨f, rfl⟩, hfp, ?_⟩ rw [← Set.compl_subset_compl, ← hs, basicOpen_eq_zeroLocus_compl, compl_compl] exact zeroLocus_anti_mono (Set.singleton_subset_iff.mpr hfs)
import Mathlib.Algebra.Order.Ring.Defs import Mathlib.Combinatorics.SimpleGraph.Basic import Mathlib.Data.Sym.Card open Finset Function namespace SimpleGraph variable {V : Type*} (G : SimpleGraph V) {e : Sym2 V} section EdgeFinset variable {G₁ G₂ : SimpleGraph V} [Fintype G.edgeSet] [Fintype G₁.edgeSet] [Fintype G₂.edgeSet] abbrev edgeFinset : Finset (Sym2 V) := Set.toFinset G.edgeSet #align simple_graph.edge_finset SimpleGraph.edgeFinset @[norm_cast] theorem coe_edgeFinset : (G.edgeFinset : Set (Sym2 V)) = G.edgeSet := Set.coe_toFinset _ #align simple_graph.coe_edge_finset SimpleGraph.coe_edgeFinset variable {G} theorem mem_edgeFinset : e ∈ G.edgeFinset ↔ e ∈ G.edgeSet := Set.mem_toFinset #align simple_graph.mem_edge_finset SimpleGraph.mem_edgeFinset theorem not_isDiag_of_mem_edgeFinset : e ∈ G.edgeFinset → ¬e.IsDiag := not_isDiag_of_mem_edgeSet _ ∘ mem_edgeFinset.1 #align simple_graph.not_is_diag_of_mem_edge_finset SimpleGraph.not_isDiag_of_mem_edgeFinset theorem edgeFinset_inj : G₁.edgeFinset = G₂.edgeFinset ↔ G₁ = G₂ := by simp #align simple_graph.edge_finset_inj SimpleGraph.edgeFinset_inj theorem edgeFinset_subset_edgeFinset : G₁.edgeFinset ⊆ G₂.edgeFinset ↔ G₁ ≤ G₂ := by simp #align simple_graph.edge_finset_subset_edge_finset SimpleGraph.edgeFinset_subset_edgeFinset theorem edgeFinset_ssubset_edgeFinset : G₁.edgeFinset ⊂ G₂.edgeFinset ↔ G₁ < G₂ := by simp #align simple_graph.edge_finset_ssubset_edge_finset SimpleGraph.edgeFinset_ssubset_edgeFinset @[gcongr] alias ⟨_, edgeFinset_mono⟩ := edgeFinset_subset_edgeFinset #align simple_graph.edge_finset_mono SimpleGraph.edgeFinset_mono alias ⟨_, edgeFinset_strict_mono⟩ := edgeFinset_ssubset_edgeFinset #align simple_graph.edge_finset_strict_mono SimpleGraph.edgeFinset_strict_mono attribute [mono] edgeFinset_mono edgeFinset_strict_mono @[simp] theorem edgeFinset_bot : (⊥ : SimpleGraph V).edgeFinset = ∅ := by simp [edgeFinset] #align simple_graph.edge_finset_bot SimpleGraph.edgeFinset_bot @[simp] theorem edgeFinset_sup [Fintype (edgeSet (G₁ ⊔ G₂))] [DecidableEq V] : (G₁ ⊔ G₂).edgeFinset = G₁.edgeFinset ∪ G₂.edgeFinset := by simp [edgeFinset] #align simple_graph.edge_finset_sup SimpleGraph.edgeFinset_sup @[simp] theorem edgeFinset_inf [DecidableEq V] : (G₁ ⊓ G₂).edgeFinset = G₁.edgeFinset ∩ G₂.edgeFinset := by simp [edgeFinset] #align simple_graph.edge_finset_inf SimpleGraph.edgeFinset_inf @[simp] theorem edgeFinset_sdiff [DecidableEq V] : (G₁ \ G₂).edgeFinset = G₁.edgeFinset \ G₂.edgeFinset := by simp [edgeFinset] #align simple_graph.edge_finset_sdiff SimpleGraph.edgeFinset_sdiff theorem edgeFinset_card : G.edgeFinset.card = Fintype.card G.edgeSet := Set.toFinset_card _ #align simple_graph.edge_finset_card SimpleGraph.edgeFinset_card @[simp] theorem edgeSet_univ_card : (univ : Finset G.edgeSet).card = G.edgeFinset.card := Fintype.card_of_subtype G.edgeFinset fun _ => mem_edgeFinset #align simple_graph.edge_set_univ_card SimpleGraph.edgeSet_univ_card variable [Fintype V] @[simp] theorem edgeFinset_top [DecidableEq V] : (⊤ : SimpleGraph V).edgeFinset = univ.filter fun e => ¬e.IsDiag := by rw [← coe_inj]; simp	Mathlib/Combinatorics/SimpleGraph/Finite.lean	125	127	theorem card_edgeFinset_top_eq_card_choose_two [DecidableEq V] : (⊤ : SimpleGraph V).edgeFinset.card = (Fintype.card V).choose 2 := by	simp_rw [Set.toFinset_card, edgeSet_top, Set.coe_setOf, ← Sym2.card_subtype_not_diag]
import Mathlib.Logic.Relation import Mathlib.Data.Option.Basic import Mathlib.Data.Seq.Seq #align_import data.seq.wseq from "leanprover-community/mathlib"@"a7e36e48519ab281320c4d192da6a7b348ce40ad" namespace Stream' open Function universe u v w def WSeq (α) := Seq (Option α) #align stream.wseq Stream'.WSeq namespace WSeq variable {α : Type u} {β : Type v} {γ : Type w} @[coe] def ofSeq : Seq α → WSeq α := (· <$> ·) some #align stream.wseq.of_seq Stream'.WSeq.ofSeq @[coe] def ofList (l : List α) : WSeq α := ofSeq l #align stream.wseq.of_list Stream'.WSeq.ofList @[coe] def ofStream (l : Stream' α) : WSeq α := ofSeq l #align stream.wseq.of_stream Stream'.WSeq.ofStream instance coeSeq : Coe (Seq α) (WSeq α) := ⟨ofSeq⟩ #align stream.wseq.coe_seq Stream'.WSeq.coeSeq instance coeList : Coe (List α) (WSeq α) := ⟨ofList⟩ #align stream.wseq.coe_list Stream'.WSeq.coeList instance coeStream : Coe (Stream' α) (WSeq α) := ⟨ofStream⟩ #align stream.wseq.coe_stream Stream'.WSeq.coeStream def nil : WSeq α := Seq.nil #align stream.wseq.nil Stream'.WSeq.nil instance inhabited : Inhabited (WSeq α) := ⟨nil⟩ #align stream.wseq.inhabited Stream'.WSeq.inhabited def cons (a : α) : WSeq α → WSeq α := Seq.cons (some a) #align stream.wseq.cons Stream'.WSeq.cons def think : WSeq α → WSeq α := Seq.cons none #align stream.wseq.think Stream'.WSeq.think def destruct : WSeq α → Computation (Option (α × WSeq α)) := Computation.corec fun s => match Seq.destruct s with \| none => Sum.inl none \| some (none, s') => Sum.inr s' \| some (some a, s') => Sum.inl (some (a, s')) #align stream.wseq.destruct Stream'.WSeq.destruct def recOn {C : WSeq α → Sort v} (s : WSeq α) (h1 : C nil) (h2 : ∀ x s, C (cons x s)) (h3 : ∀ s, C (think s)) : C s := Seq.recOn s h1 fun o => Option.recOn o h3 h2 #align stream.wseq.rec_on Stream'.WSeq.recOn protected def Mem (a : α) (s : WSeq α) := Seq.Mem (some a) s #align stream.wseq.mem Stream'.WSeq.Mem instance membership : Membership α (WSeq α) := ⟨WSeq.Mem⟩ #align stream.wseq.has_mem Stream'.WSeq.membership theorem not_mem_nil (a : α) : a ∉ @nil α := Seq.not_mem_nil (some a) #align stream.wseq.not_mem_nil Stream'.WSeq.not_mem_nil def head (s : WSeq α) : Computation (Option α) := Computation.map (Prod.fst <$> ·) (destruct s) #align stream.wseq.head Stream'.WSeq.head def flatten : Computation (WSeq α) → WSeq α := Seq.corec fun c => match Computation.destruct c with \| Sum.inl s => Seq.omap (return ·) (Seq.destruct s) \| Sum.inr c' => some (none, c') #align stream.wseq.flatten Stream'.WSeq.flatten def tail (s : WSeq α) : WSeq α := flatten <\| (fun o => Option.recOn o nil Prod.snd) <$> destruct s #align stream.wseq.tail Stream'.WSeq.tail def drop (s : WSeq α) : ℕ → WSeq α \| 0 => s \| n + 1 => tail (drop s n) #align stream.wseq.drop Stream'.WSeq.drop def get? (s : WSeq α) (n : ℕ) : Computation (Option α) := head (drop s n) #align stream.wseq.nth Stream'.WSeq.get? def toList (s : WSeq α) : Computation (List α) := @Computation.corec (List α) (List α × WSeq α) (fun ⟨l, s⟩ => match Seq.destruct s with \| none => Sum.inl l.reverse \| some (none, s') => Sum.inr (l, s') \| some (some a, s') => Sum.inr (a::l, s')) ([], s) #align stream.wseq.to_list Stream'.WSeq.toList def length (s : WSeq α) : Computation ℕ := @Computation.corec ℕ (ℕ × WSeq α) (fun ⟨n, s⟩ => match Seq.destruct s with \| none => Sum.inl n \| some (none, s') => Sum.inr (n, s') \| some (some _, s') => Sum.inr (n + 1, s')) (0, s) #align stream.wseq.length Stream'.WSeq.length class IsFinite (s : WSeq α) : Prop where out : (toList s).Terminates #align stream.wseq.is_finite Stream'.WSeq.IsFinite instance toList_terminates (s : WSeq α) [h : IsFinite s] : (toList s).Terminates := h.out #align stream.wseq.to_list_terminates Stream'.WSeq.toList_terminates def get (s : WSeq α) [IsFinite s] : List α := (toList s).get #align stream.wseq.get Stream'.WSeq.get class Productive (s : WSeq α) : Prop where get?_terminates : ∀ n, (get? s n).Terminates #align stream.wseq.productive Stream'.WSeq.Productive #align stream.wseq.productive.nth_terminates Stream'.WSeq.Productive.get?_terminates theorem productive_iff (s : WSeq α) : Productive s ↔ ∀ n, (get? s n).Terminates := ⟨fun h => h.1, fun h => ⟨h⟩⟩ #align stream.wseq.productive_iff Stream'.WSeq.productive_iff instance get?_terminates (s : WSeq α) [h : Productive s] : ∀ n, (get? s n).Terminates := h.get?_terminates #align stream.wseq.nth_terminates Stream'.WSeq.get?_terminates instance head_terminates (s : WSeq α) [Productive s] : (head s).Terminates := s.get?_terminates 0 #align stream.wseq.head_terminates Stream'.WSeq.head_terminates def updateNth (s : WSeq α) (n : ℕ) (a : α) : WSeq α := @Seq.corec (Option α) (ℕ × WSeq α) (fun ⟨n, s⟩ => match Seq.destruct s, n with \| none, _ => none \| some (none, s'), n => some (none, n, s') \| some (some a', s'), 0 => some (some a', 0, s') \| some (some _, s'), 1 => some (some a, 0, s') \| some (some a', s'), n + 2 => some (some a', n + 1, s')) (n + 1, s) #align stream.wseq.update_nth Stream'.WSeq.updateNth def removeNth (s : WSeq α) (n : ℕ) : WSeq α := @Seq.corec (Option α) (ℕ × WSeq α) (fun ⟨n, s⟩ => match Seq.destruct s, n with \| none, _ => none \| some (none, s'), n => some (none, n, s') \| some (some a', s'), 0 => some (some a', 0, s') \| some (some _, s'), 1 => some (none, 0, s') \| some (some a', s'), n + 2 => some (some a', n + 1, s')) (n + 1, s) #align stream.wseq.remove_nth Stream'.WSeq.removeNth def filterMap (f : α → Option β) : WSeq α → WSeq β := Seq.corec fun s => match Seq.destruct s with \| none => none \| some (none, s') => some (none, s') \| some (some a, s') => some (f a, s') #align stream.wseq.filter_map Stream'.WSeq.filterMap def filter (p : α → Prop) [DecidablePred p] : WSeq α → WSeq α := filterMap fun a => if p a then some a else none #align stream.wseq.filter Stream'.WSeq.filter -- example of infinite list manipulations def find (p : α → Prop) [DecidablePred p] (s : WSeq α) : Computation (Option α) := head <\| filter p s #align stream.wseq.find Stream'.WSeq.find def zipWith (f : α → β → γ) (s1 : WSeq α) (s2 : WSeq β) : WSeq γ := @Seq.corec (Option γ) (WSeq α × WSeq β) (fun ⟨s1, s2⟩ => match Seq.destruct s1, Seq.destruct s2 with \| some (none, s1'), some (none, s2') => some (none, s1', s2') \| some (some _, _), some (none, s2') => some (none, s1, s2') \| some (none, s1'), some (some _, _) => some (none, s1', s2) \| some (some a1, s1'), some (some a2, s2') => some (some (f a1 a2), s1', s2') \| _, _ => none) (s1, s2) #align stream.wseq.zip_with Stream'.WSeq.zipWith def zip : WSeq α → WSeq β → WSeq (α × β) := zipWith Prod.mk #align stream.wseq.zip Stream'.WSeq.zip def findIndexes (p : α → Prop) [DecidablePred p] (s : WSeq α) : WSeq ℕ := (zip s (Stream'.nats : WSeq ℕ)).filterMap fun ⟨a, n⟩ => if p a then some n else none #align stream.wseq.find_indexes Stream'.WSeq.findIndexes def findIndex (p : α → Prop) [DecidablePred p] (s : WSeq α) : Computation ℕ := (fun o => Option.getD o 0) <$> head (findIndexes p s) #align stream.wseq.find_index Stream'.WSeq.findIndex def indexOf [DecidableEq α] (a : α) : WSeq α → Computation ℕ := findIndex (Eq a) #align stream.wseq.index_of Stream'.WSeq.indexOf def indexesOf [DecidableEq α] (a : α) : WSeq α → WSeq ℕ := findIndexes (Eq a) #align stream.wseq.indexes_of Stream'.WSeq.indexesOf def union (s1 s2 : WSeq α) : WSeq α := @Seq.corec (Option α) (WSeq α × WSeq α) (fun ⟨s1, s2⟩ => match Seq.destruct s1, Seq.destruct s2 with \| none, none => none \| some (a1, s1'), none => some (a1, s1', nil) \| none, some (a2, s2') => some (a2, nil, s2') \| some (none, s1'), some (none, s2') => some (none, s1', s2') \| some (some a1, s1'), some (none, s2') => some (some a1, s1', s2') \| some (none, s1'), some (some a2, s2') => some (some a2, s1', s2') \| some (some a1, s1'), some (some a2, s2') => some (some a1, cons a2 s1', s2')) (s1, s2) #align stream.wseq.union Stream'.WSeq.union def isEmpty (s : WSeq α) : Computation Bool := Computation.map Option.isNone <\| head s #align stream.wseq.is_empty Stream'.WSeq.isEmpty def compute (s : WSeq α) : WSeq α := match Seq.destruct s with \| some (none, s') => s' \| _ => s #align stream.wseq.compute Stream'.WSeq.compute def take (s : WSeq α) (n : ℕ) : WSeq α := @Seq.corec (Option α) (ℕ × WSeq α) (fun ⟨n, s⟩ => match n, Seq.destruct s with \| 0, _ => none \| _ + 1, none => none \| m + 1, some (none, s') => some (none, m + 1, s') \| m + 1, some (some a, s') => some (some a, m, s')) (n, s) #align stream.wseq.take Stream'.WSeq.take def splitAt (s : WSeq α) (n : ℕ) : Computation (List α × WSeq α) := @Computation.corec (List α × WSeq α) (ℕ × List α × WSeq α) (fun ⟨n, l, s⟩ => match n, Seq.destruct s with \| 0, _ => Sum.inl (l.reverse, s) \| _ + 1, none => Sum.inl (l.reverse, s) \| _ + 1, some (none, s') => Sum.inr (n, l, s') \| m + 1, some (some a, s') => Sum.inr (m, a::l, s')) (n, [], s) #align stream.wseq.split_at Stream'.WSeq.splitAt def any (s : WSeq α) (p : α → Bool) : Computation Bool := Computation.corec (fun s : WSeq α => match Seq.destruct s with \| none => Sum.inl false \| some (none, s') => Sum.inr s' \| some (some a, s') => if p a then Sum.inl true else Sum.inr s') s #align stream.wseq.any Stream'.WSeq.any def all (s : WSeq α) (p : α → Bool) : Computation Bool := Computation.corec (fun s : WSeq α => match Seq.destruct s with \| none => Sum.inl true \| some (none, s') => Sum.inr s' \| some (some a, s') => if p a then Sum.inr s' else Sum.inl false) s #align stream.wseq.all Stream'.WSeq.all def scanl (f : α → β → α) (a : α) (s : WSeq β) : WSeq α := cons a <\| @Seq.corec (Option α) (α × WSeq β) (fun ⟨a, s⟩ => match Seq.destruct s with \| none => none \| some (none, s') => some (none, a, s') \| some (some b, s') => let a' := f a b some (some a', a', s')) (a, s) #align stream.wseq.scanl Stream'.WSeq.scanl def inits (s : WSeq α) : WSeq (List α) := cons [] <\| @Seq.corec (Option (List α)) (Batteries.DList α × WSeq α) (fun ⟨l, s⟩ => match Seq.destruct s with \| none => none \| some (none, s') => some (none, l, s') \| some (some a, s') => let l' := l.push a some (some l'.toList, l', s')) (Batteries.DList.empty, s) #align stream.wseq.inits Stream'.WSeq.inits def collect (s : WSeq α) (n : ℕ) : List α := (Seq.take n s).filterMap id #align stream.wseq.collect Stream'.WSeq.collect def append : WSeq α → WSeq α → WSeq α := Seq.append #align stream.wseq.append Stream'.WSeq.append def map (f : α → β) : WSeq α → WSeq β := Seq.map (Option.map f) #align stream.wseq.map Stream'.WSeq.map def join (S : WSeq (WSeq α)) : WSeq α := Seq.join ((fun o : Option (WSeq α) => match o with \| none => Seq1.ret none \| some s => (none, s)) <$> S) #align stream.wseq.join Stream'.WSeq.join def bind (s : WSeq α) (f : α → WSeq β) : WSeq β := join (map f s) #align stream.wseq.bind Stream'.WSeq.bind @[simp] def LiftRelO (R : α → β → Prop) (C : WSeq α → WSeq β → Prop) : Option (α × WSeq α) → Option (β × WSeq β) → Prop \| none, none => True \| some (a, s), some (b, t) => R a b ∧ C s t \| _, _ => False #align stream.wseq.lift_rel_o Stream'.WSeq.LiftRelO theorem LiftRelO.imp {R S : α → β → Prop} {C D : WSeq α → WSeq β → Prop} (H1 : ∀ a b, R a b → S a b) (H2 : ∀ s t, C s t → D s t) : ∀ {o p}, LiftRelO R C o p → LiftRelO S D o p \| none, none, _ => trivial \| some (_, _), some (_, _), h => And.imp (H1 _ _) (H2 _ _) h \| none, some _, h => False.elim h \| some (_, _), none, h => False.elim h #align stream.wseq.lift_rel_o.imp Stream'.WSeq.LiftRelO.imp theorem LiftRelO.imp_right (R : α → β → Prop) {C D : WSeq α → WSeq β → Prop} (H : ∀ s t, C s t → D s t) {o p} : LiftRelO R C o p → LiftRelO R D o p := LiftRelO.imp (fun _ _ => id) H #align stream.wseq.lift_rel_o.imp_right Stream'.WSeq.LiftRelO.imp_right @[simp] def BisimO (R : WSeq α → WSeq α → Prop) : Option (α × WSeq α) → Option (α × WSeq α) → Prop := LiftRelO (· = ·) R #align stream.wseq.bisim_o Stream'.WSeq.BisimO theorem BisimO.imp {R S : WSeq α → WSeq α → Prop} (H : ∀ s t, R s t → S s t) {o p} : BisimO R o p → BisimO S o p := LiftRelO.imp_right _ H #align stream.wseq.bisim_o.imp Stream'.WSeq.BisimO.imp def LiftRel (R : α → β → Prop) (s : WSeq α) (t : WSeq β) : Prop := ∃ C : WSeq α → WSeq β → Prop, C s t ∧ ∀ {s t}, C s t → Computation.LiftRel (LiftRelO R C) (destruct s) (destruct t) #align stream.wseq.lift_rel Stream'.WSeq.LiftRel def Equiv : WSeq α → WSeq α → Prop := LiftRel (· = ·) #align stream.wseq.equiv Stream'.WSeq.Equiv theorem liftRel_destruct {R : α → β → Prop} {s : WSeq α} {t : WSeq β} : LiftRel R s t → Computation.LiftRel (LiftRelO R (LiftRel R)) (destruct s) (destruct t) \| ⟨R, h1, h2⟩ => by refine Computation.LiftRel.imp ?_ _ _ (h2 h1) apply LiftRelO.imp_right exact fun s' t' h' => ⟨R, h', @h2⟩ #align stream.wseq.lift_rel_destruct Stream'.WSeq.liftRel_destruct theorem liftRel_destruct_iff {R : α → β → Prop} {s : WSeq α} {t : WSeq β} : LiftRel R s t ↔ Computation.LiftRel (LiftRelO R (LiftRel R)) (destruct s) (destruct t) := ⟨liftRel_destruct, fun h => ⟨fun s t => LiftRel R s t ∨ Computation.LiftRel (LiftRelO R (LiftRel R)) (destruct s) (destruct t), Or.inr h, fun {s t} h => by have h : Computation.LiftRel (LiftRelO R (LiftRel R)) (destruct s) (destruct t) := by cases' h with h h · exact liftRel_destruct h · assumption apply Computation.LiftRel.imp _ _ _ h intro a b apply LiftRelO.imp_right intro s t apply Or.inl⟩⟩ #align stream.wseq.lift_rel_destruct_iff Stream'.WSeq.liftRel_destruct_iff -- Porting note: To avoid ambiguous notation, `~` became `~ʷ`. infixl:50 " ~ʷ " => Equiv theorem destruct_congr {s t : WSeq α} : s ~ʷ t → Computation.LiftRel (BisimO (· ~ʷ ·)) (destruct s) (destruct t) := liftRel_destruct #align stream.wseq.destruct_congr Stream'.WSeq.destruct_congr theorem destruct_congr_iff {s t : WSeq α} : s ~ʷ t ↔ Computation.LiftRel (BisimO (· ~ʷ ·)) (destruct s) (destruct t) := liftRel_destruct_iff #align stream.wseq.destruct_congr_iff Stream'.WSeq.destruct_congr_iff theorem LiftRel.refl (R : α → α → Prop) (H : Reflexive R) : Reflexive (LiftRel R) := fun s => by refine ⟨(· = ·), rfl, fun {s t} (h : s = t) => ?_⟩ rw [← h] apply Computation.LiftRel.refl intro a cases' a with a · simp · cases a simp only [LiftRelO, and_true] apply H #align stream.wseq.lift_rel.refl Stream'.WSeq.LiftRel.refl theorem LiftRelO.swap (R : α → β → Prop) (C) : swap (LiftRelO R C) = LiftRelO (swap R) (swap C) := by funext x y rcases x with ⟨⟩ \| ⟨hx, jx⟩ <;> rcases y with ⟨⟩ \| ⟨hy, jy⟩ <;> rfl #align stream.wseq.lift_rel_o.swap Stream'.WSeq.LiftRelO.swap theorem LiftRel.swap_lem {R : α → β → Prop} {s1 s2} (h : LiftRel R s1 s2) : LiftRel (swap R) s2 s1 := by refine ⟨swap (LiftRel R), h, fun {s t} (h : LiftRel R t s) => ?_⟩ rw [← LiftRelO.swap, Computation.LiftRel.swap] apply liftRel_destruct h #align stream.wseq.lift_rel.swap_lem Stream'.WSeq.LiftRel.swap_lem theorem LiftRel.swap (R : α → β → Prop) : swap (LiftRel R) = LiftRel (swap R) := funext fun _ => funext fun _ => propext ⟨LiftRel.swap_lem, LiftRel.swap_lem⟩ #align stream.wseq.lift_rel.swap Stream'.WSeq.LiftRel.swap theorem LiftRel.symm (R : α → α → Prop) (H : Symmetric R) : Symmetric (LiftRel R) := fun s1 s2 (h : Function.swap (LiftRel R) s2 s1) => by rwa [LiftRel.swap, H.swap_eq] at h #align stream.wseq.lift_rel.symm Stream'.WSeq.LiftRel.symm theorem LiftRel.trans (R : α → α → Prop) (H : Transitive R) : Transitive (LiftRel R) := fun s t u h1 h2 => by refine ⟨fun s u => ∃ t, LiftRel R s t ∧ LiftRel R t u, ⟨t, h1, h2⟩, fun {s u} h => ?_⟩ rcases h with ⟨t, h1, h2⟩ have h1 := liftRel_destruct h1 have h2 := liftRel_destruct h2 refine Computation.liftRel_def.2 ⟨(Computation.terminates_of_liftRel h1).trans (Computation.terminates_of_liftRel h2), fun {a c} ha hc => ?_⟩ rcases h1.left ha with ⟨b, hb, t1⟩ have t2 := Computation.rel_of_liftRel h2 hb hc cases' a with a <;> cases' c with c · trivial · cases b · cases t2 · cases t1 · cases a cases' b with b · cases t1 · cases b cases t2 · cases' a with a s cases' b with b · cases t1 cases' b with b t cases' c with c u cases' t1 with ab st cases' t2 with bc tu exact ⟨H ab bc, t, st, tu⟩ #align stream.wseq.lift_rel.trans Stream'.WSeq.LiftRel.trans theorem LiftRel.equiv (R : α → α → Prop) : Equivalence R → Equivalence (LiftRel R) \| ⟨refl, symm, trans⟩ => ⟨LiftRel.refl R refl, @(LiftRel.symm R @symm), @(LiftRel.trans R @trans)⟩ #align stream.wseq.lift_rel.equiv Stream'.WSeq.LiftRel.equiv @[refl] theorem Equiv.refl : ∀ s : WSeq α, s ~ʷ s := LiftRel.refl (· = ·) Eq.refl #align stream.wseq.equiv.refl Stream'.WSeq.Equiv.refl @[symm] theorem Equiv.symm : ∀ {s t : WSeq α}, s ~ʷ t → t ~ʷ s := @(LiftRel.symm (· = ·) (@Eq.symm _)) #align stream.wseq.equiv.symm Stream'.WSeq.Equiv.symm @[trans] theorem Equiv.trans : ∀ {s t u : WSeq α}, s ~ʷ t → t ~ʷ u → s ~ʷ u := @(LiftRel.trans (· = ·) (@Eq.trans _)) #align stream.wseq.equiv.trans Stream'.WSeq.Equiv.trans theorem Equiv.equivalence : Equivalence (@Equiv α) := ⟨@Equiv.refl _, @Equiv.symm _, @Equiv.trans _⟩ #align stream.wseq.equiv.equivalence Stream'.WSeq.Equiv.equivalence open Computation @[simp] theorem destruct_nil : destruct (nil : WSeq α) = Computation.pure none := Computation.destruct_eq_pure rfl #align stream.wseq.destruct_nil Stream'.WSeq.destruct_nil @[simp] theorem destruct_cons (a : α) (s) : destruct (cons a s) = Computation.pure (some (a, s)) := Computation.destruct_eq_pure <\| by simp [destruct, cons, Computation.rmap] #align stream.wseq.destruct_cons Stream'.WSeq.destruct_cons @[simp] theorem destruct_think (s : WSeq α) : destruct (think s) = (destruct s).think := Computation.destruct_eq_think <\| by simp [destruct, think, Computation.rmap] #align stream.wseq.destruct_think Stream'.WSeq.destruct_think @[simp] theorem seq_destruct_nil : Seq.destruct (nil : WSeq α) = none := Seq.destruct_nil #align stream.wseq.seq_destruct_nil Stream'.WSeq.seq_destruct_nil @[simp] theorem seq_destruct_cons (a : α) (s) : Seq.destruct (cons a s) = some (some a, s) := Seq.destruct_cons _ _ #align stream.wseq.seq_destruct_cons Stream'.WSeq.seq_destruct_cons @[simp] theorem seq_destruct_think (s : WSeq α) : Seq.destruct (think s) = some (none, s) := Seq.destruct_cons _ _ #align stream.wseq.seq_destruct_think Stream'.WSeq.seq_destruct_think @[simp] theorem head_nil : head (nil : WSeq α) = Computation.pure none := by simp [head] #align stream.wseq.head_nil Stream'.WSeq.head_nil @[simp] theorem head_cons (a : α) (s) : head (cons a s) = Computation.pure (some a) := by simp [head] #align stream.wseq.head_cons Stream'.WSeq.head_cons @[simp] theorem head_think (s : WSeq α) : head (think s) = (head s).think := by simp [head] #align stream.wseq.head_think Stream'.WSeq.head_think @[simp] theorem flatten_pure (s : WSeq α) : flatten (Computation.pure s) = s := by refine Seq.eq_of_bisim (fun s1 s2 => flatten (Computation.pure s2) = s1) ?_ rfl intro s' s h rw [← h] simp only [Seq.BisimO, flatten, Seq.omap, pure_def, Seq.corec_eq, destruct_pure] cases Seq.destruct s with \| none => simp \| some val => cases' val with o s' simp #align stream.wseq.flatten_ret Stream'.WSeq.flatten_pure @[simp] theorem flatten_think (c : Computation (WSeq α)) : flatten c.think = think (flatten c) := Seq.destruct_eq_cons <\| by simp [flatten, think] #align stream.wseq.flatten_think Stream'.WSeq.flatten_think @[simp] theorem destruct_flatten (c : Computation (WSeq α)) : destruct (flatten c) = c >>= destruct := by refine Computation.eq_of_bisim (fun c1 c2 => c1 = c2 ∨ ∃ c, c1 = destruct (flatten c) ∧ c2 = Computation.bind c destruct) ?_ (Or.inr ⟨c, rfl, rfl⟩) intro c1 c2 h exact match c1, c2, h with \| c, _, Or.inl rfl => by cases c.destruct <;> simp \| _, _, Or.inr ⟨c, rfl, rfl⟩ => by induction' c using Computation.recOn with a c' <;> simp · cases (destruct a).destruct <;> simp · exact Or.inr ⟨c', rfl, rfl⟩ #align stream.wseq.destruct_flatten Stream'.WSeq.destruct_flatten theorem head_terminates_iff (s : WSeq α) : Terminates (head s) ↔ Terminates (destruct s) := terminates_map_iff _ (destruct s) #align stream.wseq.head_terminates_iff Stream'.WSeq.head_terminates_iff @[simp] theorem tail_nil : tail (nil : WSeq α) = nil := by simp [tail] #align stream.wseq.tail_nil Stream'.WSeq.tail_nil @[simp] theorem tail_cons (a : α) (s) : tail (cons a s) = s := by simp [tail] #align stream.wseq.tail_cons Stream'.WSeq.tail_cons @[simp] theorem tail_think (s : WSeq α) : tail (think s) = (tail s).think := by simp [tail] #align stream.wseq.tail_think Stream'.WSeq.tail_think @[simp] theorem dropn_nil (n) : drop (nil : WSeq α) n = nil := by induction n <;> simp [, drop] #align stream.wseq.dropn_nil Stream'.WSeq.dropn_nil @[simp] theorem dropn_cons (a : α) (s) (n) : drop (cons a s) (n + 1) = drop s n := by induction n with \| zero => simp [drop] \| succ n n_ih => -- porting note (#10745): was `simp [, drop]`. simp [drop, ← n_ih] #align stream.wseq.dropn_cons Stream'.WSeq.dropn_cons @[simp] theorem dropn_think (s : WSeq α) (n) : drop (think s) n = (drop s n).think := by induction n <;> simp [*, drop] #align stream.wseq.dropn_think Stream'.WSeq.dropn_think theorem dropn_add (s : WSeq α) (m) : ∀ n, drop s (m + n) = drop (drop s m) n \| 0 => rfl \| n + 1 => congr_arg tail (dropn_add s m n) #align stream.wseq.dropn_add Stream'.WSeq.dropn_add theorem dropn_tail (s : WSeq α) (n) : drop (tail s) n = drop s (n + 1) := by rw [Nat.add_comm] symm apply dropn_add #align stream.wseq.dropn_tail Stream'.WSeq.dropn_tail theorem get?_add (s : WSeq α) (m n) : get? s (m + n) = get? (drop s m) n := congr_arg head (dropn_add _ _ _) #align stream.wseq.nth_add Stream'.WSeq.get?_add theorem get?_tail (s : WSeq α) (n) : get? (tail s) n = get? s (n + 1) := congr_arg head (dropn_tail _ _) #align stream.wseq.nth_tail Stream'.WSeq.get?_tail @[simp] theorem join_nil : join nil = (nil : WSeq α) := Seq.join_nil #align stream.wseq.join_nil Stream'.WSeq.join_nil @[simp] theorem join_think (S : WSeq (WSeq α)) : join (think S) = think (join S) := by simp only [join, think] dsimp only [(· <$> ·)] simp [join, Seq1.ret] #align stream.wseq.join_think Stream'.WSeq.join_think @[simp] theorem join_cons (s : WSeq α) (S) : join (cons s S) = think (append s (join S)) := by simp only [join, think] dsimp only [(· <$> ·)] simp [join, cons, append] #align stream.wseq.join_cons Stream'.WSeq.join_cons @[simp] theorem nil_append (s : WSeq α) : append nil s = s := Seq.nil_append _ #align stream.wseq.nil_append Stream'.WSeq.nil_append @[simp] theorem cons_append (a : α) (s t) : append (cons a s) t = cons a (append s t) := Seq.cons_append _ _ _ #align stream.wseq.cons_append Stream'.WSeq.cons_append @[simp] theorem think_append (s t : WSeq α) : append (think s) t = think (append s t) := Seq.cons_append _ _ _ #align stream.wseq.think_append Stream'.WSeq.think_append @[simp] theorem append_nil (s : WSeq α) : append s nil = s := Seq.append_nil _ #align stream.wseq.append_nil Stream'.WSeq.append_nil @[simp] theorem append_assoc (s t u : WSeq α) : append (append s t) u = append s (append t u) := Seq.append_assoc _ _ _ #align stream.wseq.append_assoc Stream'.WSeq.append_assoc @[simp] def tail.aux : Option (α × WSeq α) → Computation (Option (α × WSeq α)) \| none => Computation.pure none \| some (_, s) => destruct s #align stream.wseq.tail.aux Stream'.WSeq.tail.aux theorem destruct_tail (s : WSeq α) : destruct (tail s) = destruct s >>= tail.aux := by simp only [tail, destruct_flatten, tail.aux]; rw [← bind_pure_comp, LawfulMonad.bind_assoc] apply congr_arg; ext1 (_ \| ⟨a, s⟩) <;> apply (@pure_bind Computation _ _ _ _ _ _).trans _ <;> simp #align stream.wseq.destruct_tail Stream'.WSeq.destruct_tail @[simp] def drop.aux : ℕ → Option (α × WSeq α) → Computation (Option (α × WSeq α)) \| 0 => Computation.pure \| n + 1 => fun a => tail.aux a >>= drop.aux n #align stream.wseq.drop.aux Stream'.WSeq.drop.aux theorem drop.aux_none : ∀ n, @drop.aux α n none = Computation.pure none \| 0 => rfl \| n + 1 => show Computation.bind (Computation.pure none) (drop.aux n) = Computation.pure none by rw [ret_bind, drop.aux_none n] #align stream.wseq.drop.aux_none Stream'.WSeq.drop.aux_none theorem destruct_dropn : ∀ (s : WSeq α) (n), destruct (drop s n) = destruct s >>= drop.aux n \| s, 0 => (bind_pure' _).symm \| s, n + 1 => by rw [← dropn_tail, destruct_dropn _ n, destruct_tail, LawfulMonad.bind_assoc] rfl #align stream.wseq.destruct_dropn Stream'.WSeq.destruct_dropn theorem head_terminates_of_head_tail_terminates (s : WSeq α) [T : Terminates (head (tail s))] : Terminates (head s) := (head_terminates_iff _).2 <\| by rcases (head_terminates_iff _).1 T with ⟨⟨a, h⟩⟩ simp? [tail] at h says simp only [tail, destruct_flatten] at h rcases exists_of_mem_bind h with ⟨s', h1, _⟩ unfold Functor.map at h1 exact let ⟨t, h3, _⟩ := Computation.exists_of_mem_map h1 Computation.terminates_of_mem h3 #align stream.wseq.head_terminates_of_head_tail_terminates Stream'.WSeq.head_terminates_of_head_tail_terminates theorem destruct_some_of_destruct_tail_some {s : WSeq α} {a} (h : some a ∈ destruct (tail s)) : ∃ a', some a' ∈ destruct s := by unfold tail Functor.map at h; simp only [destruct_flatten] at h rcases exists_of_mem_bind h with ⟨t, tm, td⟩; clear h rcases Computation.exists_of_mem_map tm with ⟨t', ht', ht2⟩; clear tm cases' t' with t' <;> rw [← ht2] at td <;> simp only [destruct_nil] at td · have := mem_unique td (ret_mem _) contradiction · exact ⟨_, ht'⟩ #align stream.wseq.destruct_some_of_destruct_tail_some Stream'.WSeq.destruct_some_of_destruct_tail_some theorem head_some_of_head_tail_some {s : WSeq α} {a} (h : some a ∈ head (tail s)) : ∃ a', some a' ∈ head s := by unfold head at h rcases Computation.exists_of_mem_map h with ⟨o, md, e⟩; clear h cases' o with o <;> [injection e; injection e with h']; clear h' cases' destruct_some_of_destruct_tail_some md with a am exact ⟨_, Computation.mem_map (@Prod.fst α (WSeq α) <$> ·) am⟩ #align stream.wseq.head_some_of_head_tail_some Stream'.WSeq.head_some_of_head_tail_some theorem head_some_of_get?_some {s : WSeq α} {a n} (h : some a ∈ get? s n) : ∃ a', some a' ∈ head s := by induction n generalizing a with \| zero => exact ⟨_, h⟩ \| succ n IH => let ⟨a', h'⟩ := head_some_of_head_tail_some h exact IH h' #align stream.wseq.head_some_of_nth_some Stream'.WSeq.head_some_of_get?_some instance productive_tail (s : WSeq α) [Productive s] : Productive (tail s) := ⟨fun n => by rw [get?_tail]; infer_instance⟩ #align stream.wseq.productive_tail Stream'.WSeq.productive_tail instance productive_dropn (s : WSeq α) [Productive s] (n) : Productive (drop s n) := ⟨fun m => by rw [← get?_add]; infer_instance⟩ #align stream.wseq.productive_dropn Stream'.WSeq.productive_dropn def toSeq (s : WSeq α) [Productive s] : Seq α := ⟨fun n => (get? s n).get, fun {n} h => by cases e : Computation.get (get? s (n + 1)) · assumption have := Computation.mem_of_get_eq _ e simp? [get?] at this h says simp only [get?] at this h cases' head_some_of_head_tail_some this with a' h' have := mem_unique h' (@Computation.mem_of_get_eq _ _ _ _ h) contradiction⟩ #align stream.wseq.to_seq Stream'.WSeq.toSeq	Mathlib/Data/Seq/WSeq.lean	893	896	theorem get?_terminates_le {s : WSeq α} {m n} (h : m ≤ n) : Terminates (get? s n) → Terminates (get? s m) := by	induction' h with m' _ IH exacts [id, fun T => IH (@head_terminates_of_head_tail_terminates _ _ T)]
import Mathlib.Algebra.GeomSum import Mathlib.Algebra.Order.Ring.Basic import Mathlib.Algebra.Ring.Int import Mathlib.NumberTheory.Padics.PadicVal import Mathlib.RingTheory.Ideal.Quotient #align_import number_theory.multiplicity from "leanprover-community/mathlib"@"e8638a0fcaf73e4500469f368ef9494e495099b3" open Ideal Ideal.Quotient Finset variable {R : Type} {n : ℕ} section CommRing variable [CommRing R] {a b x y : R} theorem dvd_geom_sum₂_iff_of_dvd_sub {x y p : R} (h : p ∣ x - y) : (p ∣ ∑ i ∈ range n, x ^ i y ^ (n - 1 - i)) ↔ p ∣ n * y ^ (n - 1) := by rw [← mem_span_singleton, ← Ideal.Quotient.eq] at h simp only [← mem_span_singleton, ← eq_zero_iff_mem, RingHom.map_geom_sum₂, h, geom_sum₂_self, _root_.map_mul, map_pow, map_natCast] #align dvd_geom_sum₂_iff_of_dvd_sub dvd_geom_sum₂_iff_of_dvd_sub theorem dvd_geom_sum₂_iff_of_dvd_sub' {x y p : R} (h : p ∣ x - y) : (p ∣ ∑ i ∈ range n, x ^ i * y ^ (n - 1 - i)) ↔ p ∣ n * x ^ (n - 1) := by rw [geom_sum₂_comm, dvd_geom_sum₂_iff_of_dvd_sub]; simpa using h.neg_right #align dvd_geom_sum₂_iff_of_dvd_sub' dvd_geom_sum₂_iff_of_dvd_sub' theorem dvd_geom_sum₂_self {x y : R} (h : ↑n ∣ x - y) : ↑n ∣ ∑ i ∈ range n, x ^ i * y ^ (n - 1 - i) := (dvd_geom_sum₂_iff_of_dvd_sub h).mpr (dvd_mul_right _ _) #align dvd_geom_sum₂_self dvd_geom_sum₂_self	Mathlib/NumberTheory/Multiplicity.lean	56	71	theorem sq_dvd_add_pow_sub_sub (p x : R) (n : ℕ) : p ^ 2 ∣ (x + p) ^ n - x ^ (n - 1) * p * n - x ^ n := by	cases' n with n n · simp only [pow_zero, Nat.cast_zero, sub_zero, sub_self, dvd_zero, Nat.zero_eq, mul_zero] · simp only [Nat.succ_sub_succ_eq_sub, tsub_zero, Nat.cast_succ, add_pow, Finset.sum_range_succ, Nat.choose_self, Nat.succ_sub _, tsub_self, pow_one, Nat.choose_succ_self_right, pow_zero, mul_one, Nat.cast_zero, zero_add, Nat.succ_eq_add_one, add_tsub_cancel_left] suffices p ^ 2 ∣ ∑ i ∈ range n, x ^ i * p ^ (n + 1 - i) * ↑((n + 1).choose i) by convert this; abel apply Finset.dvd_sum intro y hy calc p ^ 2 ∣ p ^ (n + 1 - y) := pow_dvd_pow p (le_tsub_of_add_le_left (by linarith [Finset.mem_range.mp hy])) _ ∣ x ^ y * p ^ (n + 1 - y) * ↑((n + 1).choose y) := dvd_mul_of_dvd_left (dvd_mul_left _ _) _
import Mathlib.Algebra.BigOperators.Group.Finset import Mathlib.LinearAlgebra.Vandermonde import Mathlib.RingTheory.Polynomial.Basic #align_import linear_algebra.lagrange from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a" open Polynomial section PolynomialDetermination namespace Polynomial variable {R : Type} [CommRing R] [IsDomain R] {f g : R[X]} noncomputable section namespace Lagrange open Polynomial section Basis variable {F : Type} [Field F] {ι : Type*} [DecidableEq ι] variable {s : Finset ι} {v : ι → F} {i j : ι} open Finset protected def basis (s : Finset ι) (v : ι → F) (i : ι) : F[X] := ∏ j ∈ s.erase i, basisDivisor (v i) (v j) #align lagrange.basis Lagrange.basis @[simp] theorem basis_empty : Lagrange.basis ∅ v i = 1 := rfl #align lagrange.basis_empty Lagrange.basis_empty @[simp] theorem basis_singleton (i : ι) : Lagrange.basis {i} v i = 1 := by rw [Lagrange.basis, erase_singleton, prod_empty] #align lagrange.basis_singleton Lagrange.basis_singleton @[simp] theorem basis_pair_left (hij : i ≠ j) : Lagrange.basis {i, j} v i = basisDivisor (v i) (v j) := by simp only [Lagrange.basis, hij, erase_insert_eq_erase, erase_eq_of_not_mem, mem_singleton, not_false_iff, prod_singleton] #align lagrange.basis_pair_left Lagrange.basis_pair_left @[simp] theorem basis_pair_right (hij : i ≠ j) : Lagrange.basis {i, j} v j = basisDivisor (v j) (v i) := by rw [pair_comm] exact basis_pair_left hij.symm #align lagrange.basis_pair_right Lagrange.basis_pair_right theorem basis_ne_zero (hvs : Set.InjOn v s) (hi : i ∈ s) : Lagrange.basis s v i ≠ 0 := by simp_rw [Lagrange.basis, prod_ne_zero_iff, Ne, mem_erase] rintro j ⟨hij, hj⟩ rw [basisDivisor_eq_zero_iff, hvs.eq_iff hi hj] exact hij.symm #align lagrange.basis_ne_zero Lagrange.basis_ne_zero @[simp]	Mathlib/LinearAlgebra/Lagrange.lean	246	252	theorem eval_basis_self (hvs : Set.InjOn v s) (hi : i ∈ s) : (Lagrange.basis s v i).eval (v i) = 1 := by	rw [Lagrange.basis, eval_prod] refine prod_eq_one fun j H => ?_ rw [eval_basisDivisor_left_of_ne] rcases mem_erase.mp H with ⟨hij, hj⟩ exact mt (hvs hi hj) hij.symm
import Mathlib.Algebra.Group.Nat import Mathlib.Algebra.Order.Sub.Canonical import Mathlib.Data.List.Perm import Mathlib.Data.Set.List import Mathlib.Init.Quot import Mathlib.Order.Hom.Basic #align_import data.multiset.basic from "leanprover-community/mathlib"@"65a1391a0106c9204fe45bc73a039f056558cb83" universe v open List Subtype Nat Function variable {α : Type} {β : Type v} {γ : Type} def Multiset.{u} (α : Type u) : Type u := Quotient (List.isSetoid α) #align multiset Multiset namespace Multiset -- Porting note: new @[coe] def ofList : List α → Multiset α := Quot.mk _ instance : Coe (List α) (Multiset α) := ⟨ofList⟩ @[simp] theorem quot_mk_to_coe (l : List α) : @Eq (Multiset α) ⟦l⟧ l := rfl #align multiset.quot_mk_to_coe Multiset.quot_mk_to_coe @[simp] theorem quot_mk_to_coe' (l : List α) : @Eq (Multiset α) (Quot.mk (· ≈ ·) l) l := rfl #align multiset.quot_mk_to_coe' Multiset.quot_mk_to_coe' @[simp] theorem quot_mk_to_coe'' (l : List α) : @Eq (Multiset α) (Quot.mk Setoid.r l) l := rfl #align multiset.quot_mk_to_coe'' Multiset.quot_mk_to_coe'' @[simp] theorem coe_eq_coe {l₁ l₂ : List α} : (l₁ : Multiset α) = l₂ ↔ l₁ ~ l₂ := Quotient.eq #align multiset.coe_eq_coe Multiset.coe_eq_coe -- Porting note: new instance; -- Porting note (#11215): TODO: move to better place instance [DecidableEq α] (l₁ l₂ : List α) : Decidable (l₁ ≈ l₂) := inferInstanceAs (Decidable (l₁ ~ l₂)) -- Porting note: `Quotient.recOnSubsingleton₂ s₁ s₂` was in parens which broke elaboration instance decidableEq [DecidableEq α] : DecidableEq (Multiset α) \| s₁, s₂ => Quotient.recOnSubsingleton₂ s₁ s₂ fun _ _ => decidable_of_iff' _ Quotient.eq #align multiset.has_decidable_eq Multiset.decidableEq protected def sizeOf [SizeOf α] (s : Multiset α) : ℕ := (Quot.liftOn s SizeOf.sizeOf) fun _ _ => Perm.sizeOf_eq_sizeOf #align multiset.sizeof Multiset.sizeOf instance [SizeOf α] : SizeOf (Multiset α) := ⟨Multiset.sizeOf⟩ protected def zero : Multiset α := @nil α #align multiset.zero Multiset.zero instance : Zero (Multiset α) := ⟨Multiset.zero⟩ instance : EmptyCollection (Multiset α) := ⟨0⟩ instance inhabitedMultiset : Inhabited (Multiset α) := ⟨0⟩ #align multiset.inhabited_multiset Multiset.inhabitedMultiset instance [IsEmpty α] : Unique (Multiset α) where default := 0 uniq := by rintro ⟨_ \| ⟨a, l⟩⟩; exacts [rfl, isEmptyElim a] @[simp] theorem coe_nil : (@nil α : Multiset α) = 0 := rfl #align multiset.coe_nil Multiset.coe_nil @[simp] theorem empty_eq_zero : (∅ : Multiset α) = 0 := rfl #align multiset.empty_eq_zero Multiset.empty_eq_zero @[simp] theorem coe_eq_zero (l : List α) : (l : Multiset α) = 0 ↔ l = [] := Iff.trans coe_eq_coe perm_nil #align multiset.coe_eq_zero Multiset.coe_eq_zero theorem coe_eq_zero_iff_isEmpty (l : List α) : (l : Multiset α) = 0 ↔ l.isEmpty := Iff.trans (coe_eq_zero l) isEmpty_iff_eq_nil.symm #align multiset.coe_eq_zero_iff_empty Multiset.coe_eq_zero_iff_isEmpty def cons (a : α) (s : Multiset α) : Multiset α := Quot.liftOn s (fun l => (a :: l : Multiset α)) fun _ _ p => Quot.sound (p.cons a) #align multiset.cons Multiset.cons @[inherit_doc Multiset.cons] infixr:67 " ::ₘ " => Multiset.cons instance : Insert α (Multiset α) := ⟨cons⟩ @[simp] theorem insert_eq_cons (a : α) (s : Multiset α) : insert a s = a ::ₘ s := rfl #align multiset.insert_eq_cons Multiset.insert_eq_cons @[simp] theorem cons_coe (a : α) (l : List α) : (a ::ₘ l : Multiset α) = (a :: l : List α) := rfl #align multiset.cons_coe Multiset.cons_coe @[simp] theorem cons_inj_left {a b : α} (s : Multiset α) : a ::ₘ s = b ::ₘ s ↔ a = b := ⟨Quot.inductionOn s fun l e => have : [a] ++ l ~ [b] ++ l := Quotient.exact e singleton_perm_singleton.1 <\| (perm_append_right_iff _).1 this, congr_arg (· ::ₘ _)⟩ #align multiset.cons_inj_left Multiset.cons_inj_left @[simp] theorem cons_inj_right (a : α) : ∀ {s t : Multiset α}, a ::ₘ s = a ::ₘ t ↔ s = t := by rintro ⟨l₁⟩ ⟨l₂⟩; simp #align multiset.cons_inj_right Multiset.cons_inj_right @[elab_as_elim] protected theorem induction {p : Multiset α → Prop} (empty : p 0) (cons : ∀ (a : α) (s : Multiset α), p s → p (a ::ₘ s)) : ∀ s, p s := by rintro ⟨l⟩; induction' l with _ _ ih <;> [exact empty; exact cons _ _ ih] #align multiset.induction Multiset.induction @[elab_as_elim] protected theorem induction_on {p : Multiset α → Prop} (s : Multiset α) (empty : p 0) (cons : ∀ (a : α) (s : Multiset α), p s → p (a ::ₘ s)) : p s := Multiset.induction empty cons s #align multiset.induction_on Multiset.induction_on theorem cons_swap (a b : α) (s : Multiset α) : a ::ₘ b ::ₘ s = b ::ₘ a ::ₘ s := Quot.inductionOn s fun _ => Quotient.sound <\| Perm.swap _ _ _ #align multiset.cons_swap Multiset.cons_swap instance : Singleton α (Multiset α) := ⟨fun a => a ::ₘ 0⟩ instance : LawfulSingleton α (Multiset α) := ⟨fun _ => rfl⟩ @[simp] theorem cons_zero (a : α) : a ::ₘ 0 = {a} := rfl #align multiset.cons_zero Multiset.cons_zero @[simp, norm_cast] theorem coe_singleton (a : α) : ([a] : Multiset α) = {a} := rfl #align multiset.coe_singleton Multiset.coe_singleton @[simp] theorem mem_singleton {a b : α} : b ∈ ({a} : Multiset α) ↔ b = a := by simp only [← cons_zero, mem_cons, iff_self_iff, or_false_iff, not_mem_zero] #align multiset.mem_singleton Multiset.mem_singleton theorem mem_singleton_self (a : α) : a ∈ ({a} : Multiset α) := by rw [← cons_zero] exact mem_cons_self _ _ #align multiset.mem_singleton_self Multiset.mem_singleton_self @[simp] theorem singleton_inj {a b : α} : ({a} : Multiset α) = {b} ↔ a = b := by simp_rw [← cons_zero] exact cons_inj_left _ #align multiset.singleton_inj Multiset.singleton_inj @[simp, norm_cast] theorem coe_eq_singleton {l : List α} {a : α} : (l : Multiset α) = {a} ↔ l = [a] := by rw [← coe_singleton, coe_eq_coe, List.perm_singleton] #align multiset.coe_eq_singleton Multiset.coe_eq_singleton @[simp] theorem singleton_eq_cons_iff {a b : α} (m : Multiset α) : {a} = b ::ₘ m ↔ a = b ∧ m = 0 := by rw [← cons_zero, cons_eq_cons] simp [eq_comm] #align multiset.singleton_eq_cons_iff Multiset.singleton_eq_cons_iff theorem pair_comm (x y : α) : ({x, y} : Multiset α) = {y, x} := cons_swap x y 0 #align multiset.pair_comm Multiset.pair_comm protected def Le (s t : Multiset α) : Prop := (Quotient.liftOn₂ s t (· <+~ ·)) fun _ _ _ _ p₁ p₂ => propext (p₂.subperm_left.trans p₁.subperm_right) #align multiset.le Multiset.Le instance : PartialOrder (Multiset α) where le := Multiset.Le le_refl := by rintro ⟨l⟩; exact Subperm.refl _ le_trans := by rintro ⟨l₁⟩ ⟨l₂⟩ ⟨l₃⟩; exact @Subperm.trans _ _ _ _ le_antisymm := by rintro ⟨l₁⟩ ⟨l₂⟩ h₁ h₂; exact Quot.sound (Subperm.antisymm h₁ h₂) instance decidableLE [DecidableEq α] : DecidableRel ((· ≤ ·) : Multiset α → Multiset α → Prop) := fun s t => Quotient.recOnSubsingleton₂ s t List.decidableSubperm #align multiset.decidable_le Multiset.decidableLE section variable {s t : Multiset α} {a : α} theorem subset_of_le : s ≤ t → s ⊆ t := Quotient.inductionOn₂ s t fun _ _ => Subperm.subset #align multiset.subset_of_le Multiset.subset_of_le alias Le.subset := subset_of_le #align multiset.le.subset Multiset.Le.subset theorem mem_of_le (h : s ≤ t) : a ∈ s → a ∈ t := mem_of_subset (subset_of_le h) #align multiset.mem_of_le Multiset.mem_of_le theorem not_mem_mono (h : s ⊆ t) : a ∉ t → a ∉ s := mt <\| @h _ #align multiset.not_mem_mono Multiset.not_mem_mono @[simp] theorem coe_le {l₁ l₂ : List α} : (l₁ : Multiset α) ≤ l₂ ↔ l₁ <+~ l₂ := Iff.rfl #align multiset.coe_le Multiset.coe_le @[elab_as_elim] theorem leInductionOn {C : Multiset α → Multiset α → Prop} {s t : Multiset α} (h : s ≤ t) (H : ∀ {l₁ l₂ : List α}, l₁ <+ l₂ → C l₁ l₂) : C s t := Quotient.inductionOn₂ s t (fun l₁ _ ⟨l, p, s⟩ => (show ⟦l⟧ = ⟦l₁⟧ from Quot.sound p) ▸ H s) h #align multiset.le_induction_on Multiset.leInductionOn theorem zero_le (s : Multiset α) : 0 ≤ s := Quot.inductionOn s fun l => (nil_sublist l).subperm #align multiset.zero_le Multiset.zero_le instance : OrderBot (Multiset α) where bot := 0 bot_le := zero_le @[simp] theorem bot_eq_zero : (⊥ : Multiset α) = 0 := rfl #align multiset.bot_eq_zero Multiset.bot_eq_zero theorem le_zero : s ≤ 0 ↔ s = 0 := le_bot_iff #align multiset.le_zero Multiset.le_zero theorem lt_cons_self (s : Multiset α) (a : α) : s < a ::ₘ s := Quot.inductionOn s fun l => suffices l <+~ a :: l ∧ ¬l ~ a :: l by simpa [lt_iff_le_and_ne] ⟨(sublist_cons _ _).subperm, fun p => _root_.ne_of_lt (lt_succ_self (length l)) p.length_eq⟩ #align multiset.lt_cons_self Multiset.lt_cons_self theorem le_cons_self (s : Multiset α) (a : α) : s ≤ a ::ₘ s := le_of_lt <\| lt_cons_self _ _ #align multiset.le_cons_self Multiset.le_cons_self theorem cons_le_cons_iff (a : α) : a ::ₘ s ≤ a ::ₘ t ↔ s ≤ t := Quotient.inductionOn₂ s t fun _ _ => subperm_cons a #align multiset.cons_le_cons_iff Multiset.cons_le_cons_iff theorem cons_le_cons (a : α) : s ≤ t → a ::ₘ s ≤ a ::ₘ t := (cons_le_cons_iff a).2 #align multiset.cons_le_cons Multiset.cons_le_cons @[simp] lemma cons_lt_cons_iff : a ::ₘ s < a ::ₘ t ↔ s < t := lt_iff_lt_of_le_iff_le' (cons_le_cons_iff _) (cons_le_cons_iff _) lemma cons_lt_cons (a : α) (h : s < t) : a ::ₘ s < a ::ₘ t := cons_lt_cons_iff.2 h theorem le_cons_of_not_mem (m : a ∉ s) : s ≤ a ::ₘ t ↔ s ≤ t := by refine ⟨?_, fun h => le_trans h <\| le_cons_self _ _⟩ suffices ∀ {t'}, s ≤ t' → a ∈ t' → a ::ₘ s ≤ t' by exact fun h => (cons_le_cons_iff a).1 (this h (mem_cons_self _ _)) introv h revert m refine leInductionOn h ?_ introv s m₁ m₂ rcases append_of_mem m₂ with ⟨r₁, r₂, rfl⟩ exact perm_middle.subperm_left.2 ((subperm_cons _).2 <\| ((sublist_or_mem_of_sublist s).resolve_right m₁).subperm) #align multiset.le_cons_of_not_mem Multiset.le_cons_of_not_mem @[simp] theorem singleton_ne_zero (a : α) : ({a} : Multiset α) ≠ 0 := ne_of_gt (lt_cons_self _ _) #align multiset.singleton_ne_zero Multiset.singleton_ne_zero @[simp] theorem singleton_le {a : α} {s : Multiset α} : {a} ≤ s ↔ a ∈ s := ⟨fun h => mem_of_le h (mem_singleton_self _), fun h => let ⟨_t, e⟩ := exists_cons_of_mem h e.symm ▸ cons_le_cons _ (zero_le _)⟩ #align multiset.singleton_le Multiset.singleton_le @[simp] lemma le_singleton : s ≤ {a} ↔ s = 0 ∨ s = {a} := Quot.induction_on s fun l ↦ by simp only [cons_zero, ← coe_singleton, quot_mk_to_coe'', coe_le, coe_eq_zero, coe_eq_coe, perm_singleton, subperm_singleton_iff] @[simp] lemma lt_singleton : s < {a} ↔ s = 0 := by simp only [lt_iff_le_and_ne, le_singleton, or_and_right, Ne, and_not_self, or_false, and_iff_left_iff_imp] rintro rfl exact (singleton_ne_zero _).symm @[simp] lemma ssubset_singleton_iff : s ⊂ {a} ↔ s = 0 := by refine ⟨fun hs ↦ eq_zero_of_subset_zero fun b hb ↦ (hs.2 ?_).elim, ?_⟩ · obtain rfl := mem_singleton.1 (hs.1 hb) rwa [singleton_subset] · rintro rfl simp end protected def add (s₁ s₂ : Multiset α) : Multiset α := (Quotient.liftOn₂ s₁ s₂ fun l₁ l₂ => ((l₁ ++ l₂ : List α) : Multiset α)) fun _ _ _ _ p₁ p₂ => Quot.sound <\| p₁.append p₂ #align multiset.add Multiset.add instance : Add (Multiset α) := ⟨Multiset.add⟩ @[simp] theorem coe_add (s t : List α) : (s + t : Multiset α) = (s ++ t : List α) := rfl #align multiset.coe_add Multiset.coe_add @[simp] theorem singleton_add (a : α) (s : Multiset α) : {a} + s = a ::ₘ s := rfl #align multiset.singleton_add Multiset.singleton_add private theorem add_le_add_iff_left' {s t u : Multiset α} : s + t ≤ s + u ↔ t ≤ u := Quotient.inductionOn₃ s t u fun _ _ _ => subperm_append_left _ instance : CovariantClass (Multiset α) (Multiset α) (· + ·) (· ≤ ·) := ⟨fun _s _t _u => add_le_add_iff_left'.2⟩ instance : ContravariantClass (Multiset α) (Multiset α) (· + ·) (· ≤ ·) := ⟨fun _s _t _u => add_le_add_iff_left'.1⟩ instance : OrderedCancelAddCommMonoid (Multiset α) where zero := 0 add := (· + ·) add_comm := fun s t => Quotient.inductionOn₂ s t fun l₁ l₂ => Quot.sound perm_append_comm add_assoc := fun s₁ s₂ s₃ => Quotient.inductionOn₃ s₁ s₂ s₃ fun l₁ l₂ l₃ => congr_arg _ <\| append_assoc l₁ l₂ l₃ zero_add := fun s => Quot.inductionOn s fun l => rfl add_zero := fun s => Quotient.inductionOn s fun l => congr_arg _ <\| append_nil l add_le_add_left := fun s₁ s₂ => add_le_add_left le_of_add_le_add_left := fun s₁ s₂ s₃ => le_of_add_le_add_left nsmul := nsmulRec theorem le_add_right (s t : Multiset α) : s ≤ s + t := by simpa using add_le_add_left (zero_le t) s #align multiset.le_add_right Multiset.le_add_right theorem le_add_left (s t : Multiset α) : s ≤ t + s := by simpa using add_le_add_right (zero_le t) s #align multiset.le_add_left Multiset.le_add_left theorem le_iff_exists_add {s t : Multiset α} : s ≤ t ↔ ∃ u, t = s + u := ⟨fun h => leInductionOn h fun s => let ⟨l, p⟩ := s.exists_perm_append ⟨l, Quot.sound p⟩, fun ⟨_u, e⟩ => e.symm ▸ le_add_right _ _⟩ #align multiset.le_iff_exists_add Multiset.le_iff_exists_add instance : CanonicallyOrderedAddCommMonoid (Multiset α) where __ := inferInstanceAs (OrderBot (Multiset α)) le_self_add := le_add_right exists_add_of_le h := leInductionOn h fun s => let ⟨l, p⟩ := s.exists_perm_append ⟨l, Quot.sound p⟩ @[simp] theorem cons_add (a : α) (s t : Multiset α) : a ::ₘ s + t = a ::ₘ (s + t) := by rw [← singleton_add, ← singleton_add, add_assoc] #align multiset.cons_add Multiset.cons_add @[simp] theorem add_cons (a : α) (s t : Multiset α) : s + a ::ₘ t = a ::ₘ (s + t) := by rw [add_comm, cons_add, add_comm] #align multiset.add_cons Multiset.add_cons @[simp] theorem mem_add {a : α} {s t : Multiset α} : a ∈ s + t ↔ a ∈ s ∨ a ∈ t := Quotient.inductionOn₂ s t fun _l₁ _l₂ => mem_append #align multiset.mem_add Multiset.mem_add theorem mem_of_mem_nsmul {a : α} {s : Multiset α} {n : ℕ} (h : a ∈ n • s) : a ∈ s := by induction' n with n ih · rw [zero_nsmul] at h exact absurd h (not_mem_zero _) · rw [succ_nsmul, mem_add] at h exact h.elim ih id #align multiset.mem_of_mem_nsmul Multiset.mem_of_mem_nsmul @[simp] theorem mem_nsmul {a : α} {s : Multiset α} {n : ℕ} (h0 : n ≠ 0) : a ∈ n • s ↔ a ∈ s := by refine ⟨mem_of_mem_nsmul, fun h => ?_⟩ obtain ⟨n, rfl⟩ := exists_eq_succ_of_ne_zero h0 rw [succ_nsmul, mem_add] exact Or.inr h #align multiset.mem_nsmul Multiset.mem_nsmul theorem nsmul_cons {s : Multiset α} (n : ℕ) (a : α) : n • (a ::ₘ s) = n • ({a} : Multiset α) + n • s := by rw [← singleton_add, nsmul_add] #align multiset.nsmul_cons Multiset.nsmul_cons def card : Multiset α →+ ℕ where toFun s := (Quot.liftOn s length) fun _l₁ _l₂ => Perm.length_eq map_zero' := rfl map_add' s t := Quotient.inductionOn₂ s t length_append #align multiset.card Multiset.card @[simp] theorem coe_card (l : List α) : card (l : Multiset α) = length l := rfl #align multiset.coe_card Multiset.coe_card @[simp] theorem length_toList (s : Multiset α) : s.toList.length = card s := by rw [← coe_card, coe_toList] #align multiset.length_to_list Multiset.length_toList @[simp, nolint simpNF] -- Porting note (#10675): `dsimp` can not prove this, yet linter complains theorem card_zero : @card α 0 = 0 := rfl #align multiset.card_zero Multiset.card_zero theorem card_add (s t : Multiset α) : card (s + t) = card s + card t := card.map_add s t #align multiset.card_add Multiset.card_add theorem card_nsmul (s : Multiset α) (n : ℕ) : card (n • s) = n * card s := by rw [card.map_nsmul s n, Nat.nsmul_eq_mul] #align multiset.card_nsmul Multiset.card_nsmul @[simp] theorem card_cons (a : α) (s : Multiset α) : card (a ::ₘ s) = card s + 1 := Quot.inductionOn s fun _l => rfl #align multiset.card_cons Multiset.card_cons @[simp] theorem card_singleton (a : α) : card ({a} : Multiset α) = 1 := by simp only [← cons_zero, card_zero, eq_self_iff_true, zero_add, card_cons] #align multiset.card_singleton Multiset.card_singleton theorem card_pair (a b : α) : card {a, b} = 2 := by rw [insert_eq_cons, card_cons, card_singleton] #align multiset.card_pair Multiset.card_pair theorem card_eq_one {s : Multiset α} : card s = 1 ↔ ∃ a, s = {a} := ⟨Quot.inductionOn s fun _l h => (List.length_eq_one.1 h).imp fun _a => congr_arg _, fun ⟨_a, e⟩ => e.symm ▸ rfl⟩ #align multiset.card_eq_one Multiset.card_eq_one theorem card_le_card {s t : Multiset α} (h : s ≤ t) : card s ≤ card t := leInductionOn h Sublist.length_le #align multiset.card_le_of_le Multiset.card_le_card @[mono] theorem card_mono : Monotone (@card α) := fun _a _b => card_le_card #align multiset.card_mono Multiset.card_mono theorem eq_of_le_of_card_le {s t : Multiset α} (h : s ≤ t) : card t ≤ card s → s = t := leInductionOn h fun s h₂ => congr_arg _ <\| s.eq_of_length_le h₂ #align multiset.eq_of_le_of_card_le Multiset.eq_of_le_of_card_le theorem card_lt_card {s t : Multiset α} (h : s < t) : card s < card t := lt_of_not_ge fun h₂ => _root_.ne_of_lt h <\| eq_of_le_of_card_le (le_of_lt h) h₂ #align multiset.card_lt_card Multiset.card_lt_card lemma card_strictMono : StrictMono (card : Multiset α → ℕ) := fun _ _ ↦ card_lt_card theorem lt_iff_cons_le {s t : Multiset α} : s < t ↔ ∃ a, a ::ₘ s ≤ t := ⟨Quotient.inductionOn₂ s t fun _l₁ _l₂ h => Subperm.exists_of_length_lt (le_of_lt h) (card_lt_card h), fun ⟨_a, h⟩ => lt_of_lt_of_le (lt_cons_self _ _) h⟩ #align multiset.lt_iff_cons_le Multiset.lt_iff_cons_le @[simp] theorem card_eq_zero {s : Multiset α} : card s = 0 ↔ s = 0 := ⟨fun h => (eq_of_le_of_card_le (zero_le _) (le_of_eq h)).symm, fun e => by simp [e]⟩ #align multiset.card_eq_zero Multiset.card_eq_zero theorem card_pos {s : Multiset α} : 0 < card s ↔ s ≠ 0 := Nat.pos_iff_ne_zero.trans <\| not_congr card_eq_zero #align multiset.card_pos Multiset.card_pos theorem card_pos_iff_exists_mem {s : Multiset α} : 0 < card s ↔ ∃ a, a ∈ s := Quot.inductionOn s fun _l => length_pos_iff_exists_mem #align multiset.card_pos_iff_exists_mem Multiset.card_pos_iff_exists_mem theorem card_eq_two {s : Multiset α} : card s = 2 ↔ ∃ x y, s = {x, y} := ⟨Quot.inductionOn s fun _l h => (List.length_eq_two.mp h).imp fun _a => Exists.imp fun _b => congr_arg _, fun ⟨_a, _b, e⟩ => e.symm ▸ rfl⟩ #align multiset.card_eq_two Multiset.card_eq_two theorem card_eq_three {s : Multiset α} : card s = 3 ↔ ∃ x y z, s = {x, y, z} := ⟨Quot.inductionOn s fun _l h => (List.length_eq_three.mp h).imp fun _a => Exists.imp fun _b => Exists.imp fun _c => congr_arg _, fun ⟨_a, _b, _c, e⟩ => e.symm ▸ rfl⟩ #align multiset.card_eq_three Multiset.card_eq_three @[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 #align multiset.strong_induction_on Multiset.strongInductionOnₓ -- Porting note: reorderd universes 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] #align multiset.strong_induction_eq Multiset.strongInductionOn_eq @[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 _ _ #align multiset.case_strong_induction_on Multiset.case_strongInductionOn 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 -- Porting note: reorderd universes #align multiset.strong_downward_induction Multiset.strongDownwardInductionₓ 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] #align multiset.strong_downward_induction_eq Multiset.strongDownwardInduction_eq @[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 #align multiset.strong_downward_induction_on Multiset.strongDownwardInductionOn 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] #align multiset.strong_downward_induction_on_eq Multiset.strongDownwardInductionOn_eq #align multiset.well_founded_lt wellFounded_lt instance instWellFoundedLT : WellFoundedLT (Multiset α) := ⟨Subrelation.wf Multiset.card_lt_card (measure Multiset.card).2⟩ #align multiset.is_well_founded_lt Multiset.instWellFoundedLT def replicate (n : ℕ) (a : α) : Multiset α := List.replicate n a #align multiset.replicate Multiset.replicate theorem coe_replicate (n : ℕ) (a : α) : (List.replicate n a : Multiset α) = replicate n a := rfl #align multiset.coe_replicate Multiset.coe_replicate @[simp] theorem replicate_zero (a : α) : replicate 0 a = 0 := rfl #align multiset.replicate_zero Multiset.replicate_zero @[simp] theorem replicate_succ (a : α) (n) : replicate (n + 1) a = a ::ₘ replicate n a := rfl #align multiset.replicate_succ Multiset.replicate_succ theorem replicate_add (m n : ℕ) (a : α) : replicate (m + n) a = replicate m a + replicate n a := congr_arg _ <\| List.replicate_add .. #align multiset.replicate_add Multiset.replicate_add @[simps] def replicateAddMonoidHom (a : α) : ℕ →+ Multiset α where toFun := fun n => replicate n a map_zero' := replicate_zero a map_add' := fun _ _ => replicate_add _ _ a #align multiset.replicate_add_monoid_hom Multiset.replicateAddMonoidHom #align multiset.replicate_add_monoid_hom_apply Multiset.replicateAddMonoidHom_apply theorem replicate_one (a : α) : replicate 1 a = {a} := rfl #align multiset.replicate_one Multiset.replicate_one @[simp] theorem card_replicate (n) (a : α) : card (replicate n a) = n := length_replicate n a #align multiset.card_replicate Multiset.card_replicate theorem mem_replicate {a b : α} {n : ℕ} : b ∈ replicate n a ↔ n ≠ 0 ∧ b = a := List.mem_replicate #align multiset.mem_replicate Multiset.mem_replicate theorem eq_of_mem_replicate {a b : α} {n} : b ∈ replicate n a → b = a := List.eq_of_mem_replicate #align multiset.eq_of_mem_replicate Multiset.eq_of_mem_replicate theorem eq_replicate_card {a : α} {s : Multiset α} : s = replicate (card s) a ↔ ∀ b ∈ s, b = a := Quot.inductionOn s fun _l => coe_eq_coe.trans <\| perm_replicate.trans eq_replicate_length #align multiset.eq_replicate_card Multiset.eq_replicate_card alias ⟨_, eq_replicate_of_mem⟩ := eq_replicate_card #align multiset.eq_replicate_of_mem Multiset.eq_replicate_of_mem theorem eq_replicate {a : α} {n} {s : Multiset α} : s = replicate n a ↔ card s = n ∧ ∀ b ∈ s, b = a := ⟨fun h => h.symm ▸ ⟨card_replicate _ _, fun _b => eq_of_mem_replicate⟩, fun ⟨e, al⟩ => e ▸ eq_replicate_of_mem al⟩ #align multiset.eq_replicate Multiset.eq_replicate theorem replicate_right_injective {n : ℕ} (hn : n ≠ 0) : Injective (@replicate α n) := fun _ _ h => (eq_replicate.1 h).2 _ <\| mem_replicate.2 ⟨hn, rfl⟩ #align multiset.replicate_right_injective Multiset.replicate_right_injective @[simp] theorem replicate_right_inj {a b : α} {n : ℕ} (h : n ≠ 0) : replicate n a = replicate n b ↔ a = b := (replicate_right_injective h).eq_iff #align multiset.replicate_right_inj Multiset.replicate_right_inj theorem replicate_left_injective (a : α) : Injective (replicate · a) := -- Porting note: was `fun m n h => by rw [← (eq_replicate.1 h).1, card_replicate]` LeftInverse.injective (card_replicate · a) #align multiset.replicate_left_injective Multiset.replicate_left_injective theorem replicate_subset_singleton (n : ℕ) (a : α) : replicate n a ⊆ {a} := List.replicate_subset_singleton n a #align multiset.replicate_subset_singleton Multiset.replicate_subset_singleton theorem replicate_le_coe {a : α} {n} {l : List α} : replicate n a ≤ l ↔ List.replicate n a <+ l := ⟨fun ⟨_l', p, s⟩ => perm_replicate.1 p ▸ s, Sublist.subperm⟩ #align multiset.replicate_le_coe Multiset.replicate_le_coe theorem nsmul_replicate {a : α} (n m : ℕ) : n • replicate m a = replicate (n * m) a := ((replicateAddMonoidHom a).map_nsmul _ _).symm #align multiset.nsmul_replicate Multiset.nsmul_replicate theorem nsmul_singleton (a : α) (n) : n • ({a} : Multiset α) = replicate n a := by rw [← replicate_one, nsmul_replicate, mul_one] #align multiset.nsmul_singleton Multiset.nsmul_singleton theorem replicate_le_replicate (a : α) {k n : ℕ} : replicate k a ≤ replicate n a ↔ k ≤ n := _root_.trans (by rw [← replicate_le_coe, coe_replicate]) (List.replicate_sublist_replicate a) #align multiset.replicate_le_replicate Multiset.replicate_le_replicate theorem le_replicate_iff {m : Multiset α} {a : α} {n : ℕ} : m ≤ replicate n a ↔ ∃ k ≤ n, m = replicate k a := ⟨fun h => ⟨card m, (card_mono h).trans_eq (card_replicate _ _), eq_replicate_card.2 fun _ hb => eq_of_mem_replicate <\| subset_of_le h hb⟩, fun ⟨_, hkn, hm⟩ => hm.symm ▸ (replicate_le_replicate _).2 hkn⟩ #align multiset.le_replicate_iff Multiset.le_replicate_iff theorem lt_replicate_succ {m : Multiset α} {x : α} {n : ℕ} : m < replicate (n + 1) x ↔ m ≤ replicate n x := by rw [lt_iff_cons_le] constructor · rintro ⟨x', hx'⟩ have := eq_of_mem_replicate (mem_of_le hx' (mem_cons_self _ _)) rwa [this, replicate_succ, cons_le_cons_iff] at hx' · intro h rw [replicate_succ] exact ⟨x, cons_le_cons _ h⟩ #align multiset.lt_replicate_succ Multiset.lt_replicate_succ @[simp] theorem coe_reverse (l : List α) : (reverse l : Multiset α) = l := Quot.sound <\| reverse_perm _ #align multiset.coe_reverse Multiset.coe_reverse def map (f : α → β) (s : Multiset α) : Multiset β := Quot.liftOn s (fun l : List α => (l.map f : Multiset β)) fun _l₁ _l₂ p => Quot.sound (p.map f) #align multiset.map Multiset.map @[congr] theorem map_congr {f g : α → β} {s t : Multiset α} : s = t → (∀ x ∈ t, f x = g x) → map f s = map g t := by rintro rfl h induction s using Quot.inductionOn exact congr_arg _ (List.map_congr h) #align multiset.map_congr Multiset.map_congr theorem map_hcongr {β' : Type v} {m : Multiset α} {f : α → β} {f' : α → β'} (h : β = β') (hf : ∀ a ∈ m, HEq (f a) (f' a)) : HEq (map f m) (map f' m) := by subst h; simp at hf simp [map_congr rfl hf] #align multiset.map_hcongr Multiset.map_hcongr theorem forall_mem_map_iff {f : α → β} {p : β → Prop} {s : Multiset α} : (∀ y ∈ s.map f, p y) ↔ ∀ x ∈ s, p (f x) := Quotient.inductionOn' s fun _L => List.forall_mem_map_iff #align multiset.forall_mem_map_iff Multiset.forall_mem_map_iff @[simp, norm_cast] lemma map_coe (f : α → β) (l : List α) : map f l = l.map f := rfl #align multiset.coe_map Multiset.map_coe @[simp] theorem map_zero (f : α → β) : map f 0 = 0 := rfl #align multiset.map_zero Multiset.map_zero @[simp] theorem map_cons (f : α → β) (a s) : map f (a ::ₘ s) = f a ::ₘ map f s := Quot.inductionOn s fun _l => rfl #align multiset.map_cons Multiset.map_cons theorem map_comp_cons (f : α → β) (t) : map f ∘ cons t = cons (f t) ∘ map f := by ext simp #align multiset.map_comp_cons Multiset.map_comp_cons @[simp] theorem map_singleton (f : α → β) (a : α) : ({a} : Multiset α).map f = {f a} := rfl #align multiset.map_singleton Multiset.map_singleton @[simp] theorem map_replicate (f : α → β) (k : ℕ) (a : α) : (replicate k a).map f = replicate k (f a) := by simp only [← coe_replicate, map_coe, List.map_replicate] #align multiset.map_replicate Multiset.map_replicate @[simp] theorem map_add (f : α → β) (s t) : map f (s + t) = map f s + map f t := Quotient.inductionOn₂ s t fun _l₁ _l₂ => congr_arg _ <\| map_append _ _ _ #align multiset.map_add Multiset.map_add instance canLift (c) (p) [CanLift α β c p] : CanLift (Multiset α) (Multiset β) (map c) fun s => ∀ x ∈ s, p x where prf := by rintro ⟨l⟩ hl lift l to List β using hl exact ⟨l, map_coe _ _⟩ #align multiset.can_lift Multiset.canLift def mapAddMonoidHom (f : α → β) : Multiset α →+ Multiset β where toFun := map f map_zero' := map_zero _ map_add' := map_add _ #align multiset.map_add_monoid_hom Multiset.mapAddMonoidHom @[simp] theorem coe_mapAddMonoidHom (f : α → β) : (mapAddMonoidHom f : Multiset α → Multiset β) = map f := rfl #align multiset.coe_map_add_monoid_hom Multiset.coe_mapAddMonoidHom theorem map_nsmul (f : α → β) (n : ℕ) (s) : map f (n • s) = n • map f s := (mapAddMonoidHom f).map_nsmul _ _ #align multiset.map_nsmul Multiset.map_nsmul @[simp] theorem mem_map {f : α → β} {b : β} {s : Multiset α} : b ∈ map f s ↔ ∃ a, a ∈ s ∧ f a = b := Quot.inductionOn s fun _l => List.mem_map #align multiset.mem_map Multiset.mem_map @[simp] theorem card_map (f : α → β) (s) : card (map f s) = card s := Quot.inductionOn s fun _l => length_map _ _ #align multiset.card_map Multiset.card_map @[simp] theorem map_eq_zero {s : Multiset α} {f : α → β} : s.map f = 0 ↔ s = 0 := by rw [← Multiset.card_eq_zero, Multiset.card_map, Multiset.card_eq_zero] #align multiset.map_eq_zero Multiset.map_eq_zero theorem mem_map_of_mem (f : α → β) {a : α} {s : Multiset α} (h : a ∈ s) : f a ∈ map f s := mem_map.2 ⟨_, h, rfl⟩ #align multiset.mem_map_of_mem Multiset.mem_map_of_mem theorem map_eq_singleton {f : α → β} {s : Multiset α} {b : β} : map f s = {b} ↔ ∃ a : α, s = {a} ∧ f a = b := by constructor · intro h obtain ⟨a, ha⟩ : ∃ a, s = {a} := by rw [← card_eq_one, ← card_map, h, card_singleton] refine ⟨a, ha, ?_⟩ rw [← mem_singleton, ← h, ha, map_singleton, mem_singleton] · rintro ⟨a, rfl, rfl⟩ simp #align multiset.map_eq_singleton Multiset.map_eq_singleton theorem map_eq_cons [DecidableEq α] (f : α → β) (s : Multiset α) (t : Multiset β) (b : β) : (∃ a ∈ s, f a = b ∧ (s.erase a).map f = t) ↔ s.map f = b ::ₘ t := by constructor · rintro ⟨a, ha, rfl, rfl⟩ rw [← map_cons, Multiset.cons_erase ha] · intro h have : b ∈ s.map f := by rw [h] exact mem_cons_self _ _ obtain ⟨a, h1, rfl⟩ := mem_map.mp this obtain ⟨u, rfl⟩ := exists_cons_of_mem h1 rw [map_cons, cons_inj_right] at h refine ⟨a, mem_cons_self _ _, rfl, ?_⟩ rw [Multiset.erase_cons_head, h] #align multiset.map_eq_cons Multiset.map_eq_cons -- The simpNF linter says that the LHS can be simplified via `Multiset.mem_map`. -- However this is a higher priority lemma. -- https://github.com/leanprover/std4/issues/207 @[simp 1100, nolint simpNF] theorem mem_map_of_injective {f : α → β} (H : Function.Injective f) {a : α} {s : Multiset α} : f a ∈ map f s ↔ a ∈ s := Quot.inductionOn s fun _l => List.mem_map_of_injective H #align multiset.mem_map_of_injective Multiset.mem_map_of_injective @[simp] theorem map_map (g : β → γ) (f : α → β) (s : Multiset α) : map g (map f s) = map (g ∘ f) s := Quot.inductionOn s fun _l => congr_arg _ <\| List.map_map _ _ _ #align multiset.map_map Multiset.map_map theorem map_id (s : Multiset α) : map id s = s := Quot.inductionOn s fun _l => congr_arg _ <\| List.map_id _ #align multiset.map_id Multiset.map_id @[simp] theorem map_id' (s : Multiset α) : map (fun x => x) s = s := map_id s #align multiset.map_id' Multiset.map_id' -- Porting note: was a `simp` lemma in mathlib3 theorem map_const (s : Multiset α) (b : β) : map (const α b) s = replicate (card s) b := Quot.inductionOn s fun _ => congr_arg _ <\| List.map_const' _ _ #align multiset.map_const Multiset.map_const -- Porting note: was not a `simp` lemma in mathlib3 because `Function.const` was reducible @[simp] theorem map_const' (s : Multiset α) (b : β) : map (fun _ ↦ b) s = replicate (card s) b := map_const _ _ #align multiset.map_const' Multiset.map_const' theorem eq_of_mem_map_const {b₁ b₂ : β} {l : List α} (h : b₁ ∈ map (Function.const α b₂) l) : b₁ = b₂ := eq_of_mem_replicate <\| by rwa [map_const] at h #align multiset.eq_of_mem_map_const Multiset.eq_of_mem_map_const @[simp] theorem map_le_map {f : α → β} {s t : Multiset α} (h : s ≤ t) : map f s ≤ map f t := leInductionOn h fun h => (h.map f).subperm #align multiset.map_le_map Multiset.map_le_map @[simp] theorem map_lt_map {f : α → β} {s t : Multiset α} (h : s < t) : s.map f < t.map f := by refine (map_le_map h.le).lt_of_not_le fun H => h.ne <\| eq_of_le_of_card_le h.le ?_ rw [← s.card_map f, ← t.card_map f] exact card_le_card H #align multiset.map_lt_map Multiset.map_lt_map theorem map_mono (f : α → β) : Monotone (map f) := fun _ _ => map_le_map #align multiset.map_mono Multiset.map_mono theorem map_strictMono (f : α → β) : StrictMono (map f) := fun _ _ => map_lt_map #align multiset.map_strict_mono Multiset.map_strictMono @[simp] theorem map_subset_map {f : α → β} {s t : Multiset α} (H : s ⊆ t) : map f s ⊆ map f t := fun _b m => let ⟨a, h, e⟩ := mem_map.1 m mem_map.2 ⟨a, H h, e⟩ #align multiset.map_subset_map Multiset.map_subset_map theorem map_erase [DecidableEq α] [DecidableEq β] (f : α → β) (hf : Function.Injective f) (x : α) (s : Multiset α) : (s.erase x).map f = (s.map f).erase (f x) := by induction' s using Multiset.induction_on with y s ih · simp by_cases hxy : y = x · cases hxy simp · rw [s.erase_cons_tail hxy, map_cons, map_cons, (s.map f).erase_cons_tail (hf.ne hxy), ih] #align multiset.map_erase Multiset.map_erase theorem map_erase_of_mem [DecidableEq α] [DecidableEq β] (f : α → β) (s : Multiset α) {x : α} (h : x ∈ s) : (s.erase x).map f = (s.map f).erase (f x) := by induction' s using Multiset.induction_on with y s ih · simp rcases eq_or_ne y x with rfl \| hxy · simp replace h : x ∈ s := by simpa [hxy.symm] using h rw [s.erase_cons_tail hxy, map_cons, map_cons, ih h, erase_cons_tail_of_mem (mem_map_of_mem f h)] theorem map_surjective_of_surjective {f : α → β} (hf : Function.Surjective f) : Function.Surjective (map f) := by intro s induction' s using Multiset.induction_on with x s ih · exact ⟨0, map_zero _⟩ · obtain ⟨y, rfl⟩ := hf x obtain ⟨t, rfl⟩ := ih exact ⟨y ::ₘ t, map_cons _ _ _⟩ #align multiset.map_surjective_of_surjective Multiset.map_surjective_of_surjective def foldl (f : β → α → β) (H : RightCommutative f) (b : β) (s : Multiset α) : β := Quot.liftOn s (fun l => List.foldl f b l) fun _l₁ _l₂ p => p.foldl_eq H b #align multiset.foldl Multiset.foldl @[simp] theorem foldl_zero (f : β → α → β) (H b) : foldl f H b 0 = b := rfl #align multiset.foldl_zero Multiset.foldl_zero @[simp] theorem foldl_cons (f : β → α → β) (H b a s) : foldl f H b (a ::ₘ s) = foldl f H (f b a) s := Quot.inductionOn s fun _l => rfl #align multiset.foldl_cons Multiset.foldl_cons @[simp] theorem foldl_add (f : β → α → β) (H b s t) : foldl f H b (s + t) = foldl f H (foldl f H b s) t := Quotient.inductionOn₂ s t fun _l₁ _l₂ => foldl_append _ _ _ _ #align multiset.foldl_add Multiset.foldl_add def foldr (f : α → β → β) (H : LeftCommutative f) (b : β) (s : Multiset α) : β := Quot.liftOn s (fun l => List.foldr f b l) fun _l₁ _l₂ p => p.foldr_eq H b #align multiset.foldr Multiset.foldr @[simp] theorem foldr_zero (f : α → β → β) (H b) : foldr f H b 0 = b := rfl #align multiset.foldr_zero Multiset.foldr_zero @[simp] theorem foldr_cons (f : α → β → β) (H b a s) : foldr f H b (a ::ₘ s) = f a (foldr f H b s) := Quot.inductionOn s fun _l => rfl #align multiset.foldr_cons Multiset.foldr_cons @[simp] theorem foldr_singleton (f : α → β → β) (H b a) : foldr f H b ({a} : Multiset α) = f a b := rfl #align multiset.foldr_singleton Multiset.foldr_singleton @[simp] theorem foldr_add (f : α → β → β) (H b s t) : foldr f H b (s + t) = foldr f H (foldr f H b t) s := Quotient.inductionOn₂ s t fun _l₁ _l₂ => foldr_append _ _ _ _ #align multiset.foldr_add Multiset.foldr_add @[simp] theorem coe_foldr (f : α → β → β) (H : LeftCommutative f) (b : β) (l : List α) : foldr f H b l = l.foldr f b := rfl #align multiset.coe_foldr Multiset.coe_foldr @[simp] theorem coe_foldl (f : β → α → β) (H : RightCommutative f) (b : β) (l : List α) : foldl f H b l = l.foldl f b := rfl #align multiset.coe_foldl Multiset.coe_foldl theorem coe_foldr_swap (f : α → β → β) (H : LeftCommutative f) (b : β) (l : List α) : foldr f H b l = l.foldl (fun x y => f y x) b := (congr_arg (foldr f H b) (coe_reverse l)).symm.trans <\| foldr_reverse _ _ _ #align multiset.coe_foldr_swap Multiset.coe_foldr_swap theorem foldr_swap (f : α → β → β) (H : LeftCommutative f) (b : β) (s : Multiset α) : foldr f H b s = foldl (fun x y => f y x) (fun _x _y _z => (H _ _ _).symm) b s := Quot.inductionOn s fun _l => coe_foldr_swap _ _ _ _ #align multiset.foldr_swap Multiset.foldr_swap theorem foldl_swap (f : β → α → β) (H : RightCommutative f) (b : β) (s : Multiset α) : foldl f H b s = foldr (fun x y => f y x) (fun _x _y _z => (H _ _ _).symm) b s := (foldr_swap _ _ _ _).symm #align multiset.foldl_swap Multiset.foldl_swap theorem foldr_induction' (f : α → β → β) (H : LeftCommutative f) (x : β) (q : α → Prop) (p : β → Prop) (s : Multiset α) (hpqf : ∀ a b, q a → p b → p (f a b)) (px : p x) (q_s : ∀ a ∈ s, q a) : p (foldr f H x s) := by induction s using Multiset.induction with \| empty => simpa \| cons a s ihs => simp only [forall_mem_cons, foldr_cons] at q_s ⊢ exact hpqf _ _ q_s.1 (ihs q_s.2) #align multiset.foldr_induction' Multiset.foldr_induction' theorem foldr_induction (f : α → α → α) (H : LeftCommutative f) (x : α) (p : α → Prop) (s : Multiset α) (p_f : ∀ a b, p a → p b → p (f a b)) (px : p x) (p_s : ∀ a ∈ s, p a) : p (foldr f H x s) := foldr_induction' f H x p p s p_f px p_s #align multiset.foldr_induction Multiset.foldr_induction theorem foldl_induction' (f : β → α → β) (H : RightCommutative f) (x : β) (q : α → Prop) (p : β → Prop) (s : Multiset α) (hpqf : ∀ a b, q a → p b → p (f b a)) (px : p x) (q_s : ∀ a ∈ s, q a) : p (foldl f H x s) := by rw [foldl_swap] exact foldr_induction' (fun x y => f y x) (fun x y z => (H _ _ _).symm) x q p s hpqf px q_s #align multiset.foldl_induction' Multiset.foldl_induction' theorem foldl_induction (f : α → α → α) (H : RightCommutative f) (x : α) (p : α → Prop) (s : Multiset α) (p_f : ∀ a b, p a → p b → p (f b a)) (px : p x) (p_s : ∀ a ∈ s, p a) : p (foldl f H x s) := foldl_induction' f H x p p s p_f px p_s #align multiset.foldl_induction Multiset.foldl_induction nonrec def pmap {p : α → Prop} (f : ∀ a, p a → β) (s : Multiset α) : (∀ a ∈ s, p a) → Multiset β := Quot.recOn' s (fun l H => ↑(pmap f l H)) fun l₁ l₂ (pp : l₁ ~ l₂) => funext fun H₂ : ∀ a ∈ l₂, p a => have H₁ : ∀ a ∈ l₁, p a := fun a h => H₂ a (pp.subset h) have : ∀ {s₂ e H}, @Eq.ndrec (Multiset α) l₁ (fun s => (∀ a ∈ s, p a) → Multiset β) (fun _ => ↑(pmap f l₁ H₁)) s₂ e H = ↑(pmap f l₁ H₁) := by intro s₂ e _; subst e; rfl this.trans <\| Quot.sound <\| pp.pmap f #align multiset.pmap Multiset.pmap @[simp] theorem coe_pmap {p : α → Prop} (f : ∀ a, p a → β) (l : List α) (H : ∀ a ∈ l, p a) : pmap f l H = l.pmap f H := rfl #align multiset.coe_pmap Multiset.coe_pmap @[simp] theorem pmap_zero {p : α → Prop} (f : ∀ a, p a → β) (h : ∀ a ∈ (0 : Multiset α), p a) : pmap f 0 h = 0 := rfl #align multiset.pmap_zero Multiset.pmap_zero @[simp] theorem pmap_cons {p : α → Prop} (f : ∀ a, p a → β) (a : α) (m : Multiset α) : ∀ h : ∀ b ∈ a ::ₘ m, p b, pmap f (a ::ₘ m) h = f a (h a (mem_cons_self a m)) ::ₘ pmap f m fun a ha => h a <\| mem_cons_of_mem ha := Quotient.inductionOn m fun _l _h => rfl #align multiset.pmap_cons Multiset.pmap_cons def attach (s : Multiset α) : Multiset { x // x ∈ s } := pmap Subtype.mk s fun _a => id #align multiset.attach Multiset.attach @[simp] theorem coe_attach (l : List α) : @Eq (Multiset { x // x ∈ l }) (@attach α l) l.attach := rfl #align multiset.coe_attach Multiset.coe_attach 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 with l a b exact List.sizeOf_lt_sizeOf_of_mem hx #align multiset.sizeof_lt_sizeof_of_mem Multiset.sizeOf_lt_sizeOf_of_mem theorem pmap_eq_map (p : α → Prop) (f : α → β) (s : Multiset α) : ∀ H, @pmap _ _ p (fun a _ => f a) s H = map f s := Quot.inductionOn s fun l H => congr_arg _ <\| List.pmap_eq_map p f l H #align multiset.pmap_eq_map Multiset.pmap_eq_map theorem pmap_congr {p q : α → Prop} {f : ∀ a, p a → β} {g : ∀ a, q a → β} (s : Multiset α) : ∀ {H₁ H₂}, (∀ a ∈ s, ∀ (h₁ h₂), f a h₁ = g a h₂) → pmap f s H₁ = pmap g s H₂ := @(Quot.inductionOn s (fun l _H₁ _H₂ h => congr_arg _ <\| List.pmap_congr l h)) #align multiset.pmap_congr Multiset.pmap_congr theorem map_pmap {p : α → Prop} (g : β → γ) (f : ∀ a, p a → β) (s) : ∀ H, map g (pmap f s H) = pmap (fun a h => g (f a h)) s H := Quot.inductionOn s fun l H => congr_arg _ <\| List.map_pmap g f l H #align multiset.map_pmap Multiset.map_pmap theorem pmap_eq_map_attach {p : α → Prop} (f : ∀ a, p a → β) (s) : ∀ H, pmap f s H = s.attach.map fun x => f x.1 (H _ x.2) := Quot.inductionOn s fun l H => congr_arg _ <\| List.pmap_eq_map_attach f l H #align multiset.pmap_eq_map_attach Multiset.pmap_eq_map_attach -- @[simp] -- Porting note: Left hand does not simplify theorem attach_map_val' (s : Multiset α) (f : α → β) : (s.attach.map fun i => f i.val) = s.map f := Quot.inductionOn s fun l => congr_arg _ <\| List.attach_map_coe' l f #align multiset.attach_map_coe' Multiset.attach_map_val' #align multiset.attach_map_val' Multiset.attach_map_val' @[simp] theorem attach_map_val (s : Multiset α) : s.attach.map Subtype.val = s := (attach_map_val' _ _).trans s.map_id #align multiset.attach_map_coe Multiset.attach_map_val #align multiset.attach_map_val Multiset.attach_map_val @[simp] theorem mem_attach (s : Multiset α) : ∀ x, x ∈ s.attach := Quot.inductionOn s fun _l => List.mem_attach _ #align multiset.mem_attach Multiset.mem_attach @[simp] theorem mem_pmap {p : α → Prop} {f : ∀ a, p a → β} {s H b} : b ∈ pmap f s H ↔ ∃ (a : _) (h : a ∈ s), f a (H a h) = b := Quot.inductionOn s (fun _l _H => List.mem_pmap) H #align multiset.mem_pmap Multiset.mem_pmap @[simp] theorem card_pmap {p : α → Prop} (f : ∀ a, p a → β) (s H) : card (pmap f s H) = card s := Quot.inductionOn s (fun _l _H => length_pmap) H #align multiset.card_pmap Multiset.card_pmap @[simp] theorem card_attach {m : Multiset α} : card (attach m) = card m := card_pmap _ _ _ #align multiset.card_attach Multiset.card_attach @[simp] theorem attach_zero : (0 : Multiset α).attach = 0 := rfl #align multiset.attach_zero Multiset.attach_zero theorem attach_cons (a : α) (m : Multiset α) : (a ::ₘ m).attach = ⟨a, mem_cons_self a m⟩ ::ₘ m.attach.map fun p => ⟨p.1, mem_cons_of_mem p.2⟩ := Quotient.inductionOn m fun l => congr_arg _ <\| congr_arg (List.cons _) <\| by rw [List.map_pmap]; exact List.pmap_congr _ fun _ _ _ _ => Subtype.eq rfl #align multiset.attach_cons Multiset.attach_cons section variable [DecidableEq α] {s t u : Multiset α} {a b : α} protected def sub (s t : Multiset α) : Multiset α := (Quotient.liftOn₂ s t fun l₁ l₂ => (l₁.diff l₂ : Multiset α)) fun _v₁ _v₂ _w₁ _w₂ p₁ p₂ => Quot.sound <\| p₁.diff p₂ #align multiset.sub Multiset.sub instance : Sub (Multiset α) := ⟨Multiset.sub⟩ @[simp] theorem coe_sub (s t : List α) : (s - t : Multiset α) = (s.diff t : List α) := rfl #align multiset.coe_sub Multiset.coe_sub protected theorem sub_zero (s : Multiset α) : s - 0 = s := Quot.inductionOn s fun _l => rfl #align multiset.sub_zero Multiset.sub_zero @[simp] theorem sub_cons (a : α) (s t : Multiset α) : s - a ::ₘ t = s.erase a - t := Quotient.inductionOn₂ s t fun _l₁ _l₂ => congr_arg _ <\| diff_cons _ _ _ #align multiset.sub_cons Multiset.sub_cons protected theorem sub_le_iff_le_add : s - t ≤ u ↔ s ≤ u + t := by revert s exact @(Multiset.induction_on t (by simp [Multiset.sub_zero]) fun a t IH s => by simp [IH, erase_le_iff_le_cons]) #align multiset.sub_le_iff_le_add Multiset.sub_le_iff_le_add instance : OrderedSub (Multiset α) := ⟨fun _n _m _k => Multiset.sub_le_iff_le_add⟩ theorem cons_sub_of_le (a : α) {s t : Multiset α} (h : t ≤ s) : a ::ₘ s - t = a ::ₘ (s - t) := by rw [← singleton_add, ← singleton_add, add_tsub_assoc_of_le h] #align multiset.cons_sub_of_le Multiset.cons_sub_of_le theorem sub_eq_fold_erase (s t : Multiset α) : s - t = foldl erase erase_comm s t := Quotient.inductionOn₂ s t fun l₁ l₂ => by show ofList (l₁.diff l₂) = foldl erase erase_comm l₁ l₂ rw [diff_eq_foldl l₁ l₂] symm exact foldl_hom _ _ _ _ _ fun x y => rfl #align multiset.sub_eq_fold_erase Multiset.sub_eq_fold_erase @[simp] theorem card_sub {s t : Multiset α} (h : t ≤ s) : card (s - t) = card s - card t := Nat.eq_sub_of_add_eq $ by rw [← card_add, tsub_add_cancel_of_le h] #align multiset.card_sub Multiset.card_sub def union (s t : Multiset α) : Multiset α := s - t + t #align multiset.union Multiset.union instance : Union (Multiset α) := ⟨union⟩ theorem union_def (s t : Multiset α) : s ∪ t = s - t + t := rfl #align multiset.union_def Multiset.union_def theorem le_union_left (s t : Multiset α) : s ≤ s ∪ t := le_tsub_add #align multiset.le_union_left Multiset.le_union_left theorem le_union_right (s t : Multiset α) : t ≤ s ∪ t := le_add_left _ _ #align multiset.le_union_right Multiset.le_union_right theorem eq_union_left : t ≤ s → s ∪ t = s := tsub_add_cancel_of_le #align multiset.eq_union_left Multiset.eq_union_left theorem union_le_union_right (h : s ≤ t) (u) : s ∪ u ≤ t ∪ u := add_le_add_right (tsub_le_tsub_right h _) u #align multiset.union_le_union_right Multiset.union_le_union_right theorem union_le (h₁ : s ≤ u) (h₂ : t ≤ u) : s ∪ t ≤ u := by rw [← eq_union_left h₂]; exact union_le_union_right h₁ t #align multiset.union_le Multiset.union_le @[simp] theorem mem_union : a ∈ s ∪ t ↔ a ∈ s ∨ a ∈ t := ⟨fun h => (mem_add.1 h).imp_left (mem_of_le tsub_le_self), (Or.elim · (mem_of_le <\| le_union_left _ _) (mem_of_le <\| le_union_right _ _))⟩ #align multiset.mem_union Multiset.mem_union @[simp] theorem map_union [DecidableEq β] {f : α → β} (finj : Function.Injective f) {s t : Multiset α} : map f (s ∪ t) = map f s ∪ map f t := Quotient.inductionOn₂ s t fun l₁ l₂ => congr_arg ofList (by rw [List.map_append f, List.map_diff finj]) #align multiset.map_union Multiset.map_union -- Porting note (#10756): new theorem @[simp] theorem zero_union : 0 ∪ s = s := by simp [union_def] -- Porting note (#10756): new theorem @[simp] theorem union_zero : s ∪ 0 = s := by simp [union_def] def inter (s t : Multiset α) : Multiset α := Quotient.liftOn₂ s t (fun l₁ l₂ => (l₁.bagInter l₂ : Multiset α)) fun _v₁ _v₂ _w₁ _w₂ p₁ p₂ => Quot.sound <\| p₁.bagInter p₂ #align multiset.inter Multiset.inter instance : Inter (Multiset α) := ⟨inter⟩ @[simp] theorem inter_zero (s : Multiset α) : s ∩ 0 = 0 := Quot.inductionOn s fun l => congr_arg ofList l.bagInter_nil #align multiset.inter_zero Multiset.inter_zero @[simp] theorem zero_inter (s : Multiset α) : 0 ∩ s = 0 := Quot.inductionOn s fun l => congr_arg ofList l.nil_bagInter #align multiset.zero_inter Multiset.zero_inter @[simp] theorem cons_inter_of_pos {a} (s : Multiset α) {t} : a ∈ t → (a ::ₘ s) ∩ t = a ::ₘ s ∩ t.erase a := Quotient.inductionOn₂ s t fun _l₁ _l₂ h => congr_arg ofList <\| cons_bagInter_of_pos _ h #align multiset.cons_inter_of_pos Multiset.cons_inter_of_pos @[simp] theorem cons_inter_of_neg {a} (s : Multiset α) {t} : a ∉ t → (a ::ₘ s) ∩ t = s ∩ t := Quotient.inductionOn₂ s t fun _l₁ _l₂ h => congr_arg ofList <\| cons_bagInter_of_neg _ h #align multiset.cons_inter_of_neg Multiset.cons_inter_of_neg theorem inter_le_left (s t : Multiset α) : s ∩ t ≤ s := Quotient.inductionOn₂ s t fun _l₁ _l₂ => (bagInter_sublist_left _ _).subperm #align multiset.inter_le_left Multiset.inter_le_left theorem inter_le_right (s : Multiset α) : ∀ t, s ∩ t ≤ t := Multiset.induction_on s (fun t => (zero_inter t).symm ▸ zero_le _) fun a s IH t => if h : a ∈ t then by simpa [h] using cons_le_cons a (IH (t.erase a)) else by simp [h, IH] #align multiset.inter_le_right Multiset.inter_le_right theorem le_inter (h₁ : s ≤ t) (h₂ : s ≤ u) : s ≤ t ∩ u := by revert s u; refine @(Multiset.induction_on t ?_ fun a t IH => ?_) <;> intros s u h₁ h₂ · simpa only [zero_inter, nonpos_iff_eq_zero] using h₁ by_cases h : a ∈ u · rw [cons_inter_of_pos _ h, ← erase_le_iff_le_cons] exact IH (erase_le_iff_le_cons.2 h₁) (erase_le_erase _ h₂) · rw [cons_inter_of_neg _ h] exact IH ((le_cons_of_not_mem <\| mt (mem_of_le h₂) h).1 h₁) h₂ #align multiset.le_inter Multiset.le_inter @[simp] theorem mem_inter : a ∈ s ∩ t ↔ a ∈ s ∧ a ∈ t := ⟨fun h => ⟨mem_of_le (inter_le_left _ _) h, mem_of_le (inter_le_right _ _) h⟩, fun ⟨h₁, h₂⟩ => by rw [← cons_erase h₁, cons_inter_of_pos _ h₂]; apply mem_cons_self⟩ #align multiset.mem_inter Multiset.mem_inter instance : Lattice (Multiset α) := { sup := (· ∪ ·) sup_le := @union_le _ _ le_sup_left := le_union_left le_sup_right := le_union_right inf := (· ∩ ·) le_inf := @le_inter _ _ inf_le_left := inter_le_left inf_le_right := inter_le_right } @[simp] theorem sup_eq_union (s t : Multiset α) : s ⊔ t = s ∪ t := rfl #align multiset.sup_eq_union Multiset.sup_eq_union @[simp] theorem inf_eq_inter (s t : Multiset α) : s ⊓ t = s ∩ t := rfl #align multiset.inf_eq_inter Multiset.inf_eq_inter @[simp] theorem le_inter_iff : s ≤ t ∩ u ↔ s ≤ t ∧ s ≤ u := le_inf_iff #align multiset.le_inter_iff Multiset.le_inter_iff @[simp] theorem union_le_iff : s ∪ t ≤ u ↔ s ≤ u ∧ t ≤ u := sup_le_iff #align multiset.union_le_iff Multiset.union_le_iff theorem union_comm (s t : Multiset α) : s ∪ t = t ∪ s := sup_comm _ _ #align multiset.union_comm Multiset.union_comm theorem inter_comm (s t : Multiset α) : s ∩ t = t ∩ s := inf_comm _ _ #align multiset.inter_comm Multiset.inter_comm theorem eq_union_right (h : s ≤ t) : s ∪ t = t := by rw [union_comm, eq_union_left h] #align multiset.eq_union_right Multiset.eq_union_right theorem union_le_union_left (h : s ≤ t) (u) : u ∪ s ≤ u ∪ t := sup_le_sup_left h _ #align multiset.union_le_union_left Multiset.union_le_union_left theorem union_le_add (s t : Multiset α) : s ∪ t ≤ s + t := union_le (le_add_right _ _) (le_add_left _ _) #align multiset.union_le_add Multiset.union_le_add theorem union_add_distrib (s t u : Multiset α) : s ∪ t + u = s + u ∪ (t + u) := by simpa [(· ∪ ·), union, eq_comm, add_assoc] using show s + u - (t + u) = s - t by rw [add_comm t, tsub_add_eq_tsub_tsub, add_tsub_cancel_right] #align multiset.union_add_distrib Multiset.union_add_distrib theorem add_union_distrib (s t u : Multiset α) : s + (t ∪ u) = s + t ∪ (s + u) := by rw [add_comm, union_add_distrib, add_comm s, add_comm s] #align multiset.add_union_distrib Multiset.add_union_distrib theorem cons_union_distrib (a : α) (s t : Multiset α) : a ::ₘ (s ∪ t) = a ::ₘ s ∪ a ::ₘ t := by simpa using add_union_distrib (a ::ₘ 0) s t #align multiset.cons_union_distrib Multiset.cons_union_distrib theorem inter_add_distrib (s t u : Multiset α) : s ∩ t + u = (s + u) ∩ (t + u) := by by_contra h cases' lt_iff_cons_le.1 (lt_of_le_of_ne (le_inter (add_le_add_right (inter_le_left s t) u) (add_le_add_right (inter_le_right s t) u)) h) with a hl rw [← cons_add] at hl exact not_le_of_lt (lt_cons_self (s ∩ t) a) (le_inter (le_of_add_le_add_right (le_trans hl (inter_le_left _ _))) (le_of_add_le_add_right (le_trans hl (inter_le_right _ _)))) #align multiset.inter_add_distrib Multiset.inter_add_distrib theorem add_inter_distrib (s t u : Multiset α) : s + t ∩ u = (s + t) ∩ (s + u) := by rw [add_comm, inter_add_distrib, add_comm s, add_comm s] #align multiset.add_inter_distrib Multiset.add_inter_distrib theorem cons_inter_distrib (a : α) (s t : Multiset α) : a ::ₘ s ∩ t = (a ::ₘ s) ∩ (a ::ₘ t) := by simp #align multiset.cons_inter_distrib Multiset.cons_inter_distrib theorem union_add_inter (s t : Multiset α) : s ∪ t + s ∩ t = s + t := by apply _root_.le_antisymm · rw [union_add_distrib] refine union_le (add_le_add_left (inter_le_right _ _) _) ?_ rw [add_comm] exact add_le_add_right (inter_le_left _ _) _ · rw [add_comm, add_inter_distrib] refine le_inter (add_le_add_right (le_union_right _ _) _) ?_ rw [add_comm] exact add_le_add_right (le_union_left _ _) _ #align multiset.union_add_inter Multiset.union_add_inter theorem sub_add_inter (s t : Multiset α) : s - t + s ∩ t = s := by rw [inter_comm] revert s; refine Multiset.induction_on t (by simp) fun a t IH s => ?_ by_cases h : a ∈ s · rw [cons_inter_of_pos _ h, sub_cons, add_cons, IH, cons_erase h] · rw [cons_inter_of_neg _ h, sub_cons, erase_of_not_mem h, IH] #align multiset.sub_add_inter Multiset.sub_add_inter theorem sub_inter (s t : Multiset α) : s - s ∩ t = s - t := add_right_cancel <\| by rw [sub_add_inter s t, tsub_add_cancel_of_le (inter_le_left s t)] #align multiset.sub_inter Multiset.sub_inter end section variable (p : α → Prop) [DecidablePred p] def filter (s : Multiset α) : Multiset α := Quot.liftOn s (fun l => (List.filter p l : Multiset α)) fun _l₁ _l₂ h => Quot.sound <\| h.filter p #align multiset.filter Multiset.filter @[simp, norm_cast] lemma filter_coe (l : List α) : filter p l = l.filter p := rfl #align multiset.coe_filter Multiset.filter_coe @[simp] theorem filter_zero : filter p 0 = 0 := rfl #align multiset.filter_zero Multiset.filter_zero theorem filter_congr {p q : α → Prop} [DecidablePred p] [DecidablePred q] {s : Multiset α} : (∀ x ∈ s, p x ↔ q x) → filter p s = filter q s := Quot.inductionOn s fun _l h => congr_arg ofList <\| filter_congr' <\| by simpa using h #align multiset.filter_congr Multiset.filter_congr @[simp] theorem filter_add (s t : Multiset α) : filter p (s + t) = filter p s + filter p t := Quotient.inductionOn₂ s t fun _l₁ _l₂ => congr_arg ofList <\| filter_append _ _ #align multiset.filter_add Multiset.filter_add @[simp] theorem filter_le (s : Multiset α) : filter p s ≤ s := Quot.inductionOn s fun _l => (filter_sublist _).subperm #align multiset.filter_le Multiset.filter_le @[simp] theorem filter_subset (s : Multiset α) : filter p s ⊆ s := subset_of_le <\| filter_le _ _ #align multiset.filter_subset Multiset.filter_subset theorem filter_le_filter {s t} (h : s ≤ t) : filter p s ≤ filter p t := leInductionOn h fun h => (h.filter (p ·)).subperm #align multiset.filter_le_filter Multiset.filter_le_filter theorem monotone_filter_left : Monotone (filter p) := fun _s _t => filter_le_filter p #align multiset.monotone_filter_left Multiset.monotone_filter_left theorem monotone_filter_right (s : Multiset α) ⦃p q : α → Prop⦄ [DecidablePred p] [DecidablePred q] (h : ∀ b, p b → q b) : s.filter p ≤ s.filter q := Quotient.inductionOn s fun l => (l.monotone_filter_right <\| by simpa using h).subperm #align multiset.monotone_filter_right Multiset.monotone_filter_right variable {p} @[simp] theorem filter_cons_of_pos {a : α} (s) : p a → filter p (a ::ₘ s) = a ::ₘ filter p s := Quot.inductionOn s fun l h => congr_arg ofList <\| List.filter_cons_of_pos l <\| by simpa using h #align multiset.filter_cons_of_pos Multiset.filter_cons_of_pos @[simp] theorem filter_cons_of_neg {a : α} (s) : ¬p a → filter p (a ::ₘ s) = filter p s := Quot.inductionOn s fun l h => congr_arg ofList <\| List.filter_cons_of_neg l <\| by simpa using h #align multiset.filter_cons_of_neg Multiset.filter_cons_of_neg @[simp] theorem mem_filter {a : α} {s} : a ∈ filter p s ↔ a ∈ s ∧ p a := Quot.inductionOn s fun _l => by simpa using List.mem_filter (p := (p ·)) #align multiset.mem_filter Multiset.mem_filter theorem of_mem_filter {a : α} {s} (h : a ∈ filter p s) : p a := (mem_filter.1 h).2 #align multiset.of_mem_filter Multiset.of_mem_filter theorem mem_of_mem_filter {a : α} {s} (h : a ∈ filter p s) : a ∈ s := (mem_filter.1 h).1 #align multiset.mem_of_mem_filter Multiset.mem_of_mem_filter theorem mem_filter_of_mem {a : α} {l} (m : a ∈ l) (h : p a) : a ∈ filter p l := mem_filter.2 ⟨m, h⟩ #align multiset.mem_filter_of_mem Multiset.mem_filter_of_mem theorem filter_eq_self {s} : filter p s = s ↔ ∀ a ∈ s, p a := Quot.inductionOn s fun _l => Iff.trans ⟨fun h => (filter_sublist _).eq_of_length (@congr_arg _ _ _ _ card h), congr_arg ofList⟩ <\| by simp #align multiset.filter_eq_self Multiset.filter_eq_self theorem filter_eq_nil {s} : filter p s = 0 ↔ ∀ a ∈ s, ¬p a := Quot.inductionOn s fun _l => Iff.trans ⟨fun h => eq_nil_of_length_eq_zero (@congr_arg _ _ _ _ card h), congr_arg ofList⟩ <\| by simpa using List.filter_eq_nil (p := (p ·)) #align multiset.filter_eq_nil Multiset.filter_eq_nil theorem le_filter {s t} : s ≤ filter p t ↔ s ≤ t ∧ ∀ a ∈ s, p a := ⟨fun h => ⟨le_trans h (filter_le _ _), fun _a m => of_mem_filter (mem_of_le h m)⟩, fun ⟨h, al⟩ => filter_eq_self.2 al ▸ filter_le_filter p h⟩ #align multiset.le_filter Multiset.le_filter theorem filter_cons {a : α} (s : Multiset α) : filter p (a ::ₘ s) = (if p a then {a} else 0) + filter p s := by split_ifs with h · rw [filter_cons_of_pos _ h, singleton_add] · rw [filter_cons_of_neg _ h, zero_add] #align multiset.filter_cons Multiset.filter_cons theorem filter_singleton {a : α} (p : α → Prop) [DecidablePred p] : filter p {a} = if p a then {a} else ∅ := by simp only [singleton, filter_cons, filter_zero, add_zero, empty_eq_zero] #align multiset.filter_singleton Multiset.filter_singleton theorem filter_nsmul (s : Multiset α) (n : ℕ) : filter p (n • s) = n • filter p s := by refine s.induction_on ?_ ?_ · simp only [filter_zero, nsmul_zero] · intro a ha ih rw [nsmul_cons, filter_add, ih, filter_cons, nsmul_add] congr split_ifs with hp <;> · simp only [filter_eq_self, nsmul_zero, filter_eq_nil] intro b hb rwa [mem_singleton.mp (mem_of_mem_nsmul hb)] #align multiset.filter_nsmul Multiset.filter_nsmul variable (p) @[simp] theorem filter_sub [DecidableEq α] (s t : Multiset α) : filter p (s - t) = filter p s - filter p t := by revert s; refine Multiset.induction_on t (by simp) fun a t IH s => ?_ rw [sub_cons, IH] by_cases h : p a · rw [filter_cons_of_pos _ h, sub_cons] congr by_cases m : a ∈ s · rw [← cons_inj_right a, ← filter_cons_of_pos _ h, cons_erase (mem_filter_of_mem m h), cons_erase m] · rw [erase_of_not_mem m, erase_of_not_mem (mt mem_of_mem_filter m)] · rw [filter_cons_of_neg _ h] by_cases m : a ∈ s · rw [(by rw [filter_cons_of_neg _ h] : filter p (erase s a) = filter p (a ::ₘ erase s a)), cons_erase m] · rw [erase_of_not_mem m] #align multiset.filter_sub Multiset.filter_sub @[simp] theorem filter_union [DecidableEq α] (s t : Multiset α) : filter p (s ∪ t) = filter p s ∪ filter p t := by simp [(· ∪ ·), union] #align multiset.filter_union Multiset.filter_union @[simp] theorem filter_inter [DecidableEq α] (s t : Multiset α) : filter p (s ∩ t) = filter p s ∩ filter p t := le_antisymm (le_inter (filter_le_filter _ <\| inter_le_left _ _) (filter_le_filter _ <\| inter_le_right _ _)) <\| le_filter.2 ⟨inf_le_inf (filter_le _ _) (filter_le _ _), fun _a h => of_mem_filter (mem_of_le (inter_le_left _ _) h)⟩ #align multiset.filter_inter Multiset.filter_inter @[simp] theorem filter_filter (q) [DecidablePred q] (s : Multiset α) : filter p (filter q s) = filter (fun a => p a ∧ q a) s := Quot.inductionOn s fun l => by simp #align multiset.filter_filter Multiset.filter_filter lemma filter_comm (q) [DecidablePred q] (s : Multiset α) : filter p (filter q s) = filter q (filter p s) := by simp [and_comm] #align multiset.filter_comm Multiset.filter_comm theorem filter_add_filter (q) [DecidablePred q] (s : Multiset α) : filter p s + filter q s = filter (fun a => p a ∨ q a) s + filter (fun a => p a ∧ q a) s := Multiset.induction_on s rfl fun a s IH => by by_cases p a <;> by_cases q a <;> simp [] #align multiset.filter_add_filter Multiset.filter_add_filter theorem filter_add_not (s : Multiset α) : filter p s + filter (fun a => ¬p a) s = s := by rw [filter_add_filter, filter_eq_self.2, filter_eq_nil.2] · simp only [add_zero] · simp [Decidable.em, -Bool.not_eq_true, -not_and, not_and_or, or_comm] · simp only [Bool.not_eq_true, decide_eq_true_eq, Bool.eq_false_or_eq_true, decide_True, implies_true, Decidable.em] #align multiset.filter_add_not Multiset.filter_add_not theorem map_filter (f : β → α) (s : Multiset β) : filter p (map f s) = map f (filter (p ∘ f) s) := Quot.inductionOn s fun l => by simp [List.map_filter]; rfl #align multiset.map_filter Multiset.map_filter lemma map_filter' {f : α → β} (hf : Injective f) (s : Multiset α) [DecidablePred fun b => ∃ a, p a ∧ f a = b] : (s.filter p).map f = (s.map f).filter fun b => ∃ a, p a ∧ f a = b := by simp [(· ∘ ·), map_filter, hf.eq_iff] #align multiset.map_filter' Multiset.map_filter' lemma card_filter_le_iff (s : Multiset α) (P : α → Prop) [DecidablePred P] (n : ℕ) : card (s.filter P) ≤ n ↔ ∀ s' ≤ s, n < card s' → ∃ a ∈ s', ¬ P a := by fconstructor · intro H s' hs' s'_card by_contra! rid have card := card_le_card (monotone_filter_left P hs') \|>.trans H exact s'_card.not_le (filter_eq_self.mpr rid ▸ card) · contrapose! exact fun H ↦ ⟨s.filter P, filter_le _ _, H, fun a ha ↦ (mem_filter.mp ha).2⟩ def filterMap (f : α → Option β) (s : Multiset α) : Multiset β := Quot.liftOn s (fun l => (List.filterMap f l : Multiset β)) fun _l₁ _l₂ h => Quot.sound <\| h.filterMap f #align multiset.filter_map Multiset.filterMap @[simp, norm_cast] lemma filterMap_coe (f : α → Option β) (l : List α) : filterMap f l = l.filterMap f := rfl #align multiset.coe_filter_map Multiset.filterMap_coe @[simp] theorem filterMap_zero (f : α → Option β) : filterMap f 0 = 0 := rfl #align multiset.filter_map_zero Multiset.filterMap_zero @[simp] theorem filterMap_cons_none {f : α → Option β} (a : α) (s : Multiset α) (h : f a = none) : filterMap f (a ::ₘ s) = filterMap f s := Quot.inductionOn s fun l => congr_arg ofList <\| List.filterMap_cons_none a l h #align multiset.filter_map_cons_none Multiset.filterMap_cons_none @[simp] theorem filterMap_cons_some (f : α → Option β) (a : α) (s : Multiset α) {b : β} (h : f a = some b) : filterMap f (a ::ₘ s) = b ::ₘ filterMap f s := Quot.inductionOn s fun l => congr_arg ofList <\| List.filterMap_cons_some f a l h #align multiset.filter_map_cons_some Multiset.filterMap_cons_some theorem filterMap_eq_map (f : α → β) : filterMap (some ∘ f) = map f := funext fun s => Quot.inductionOn s fun l => congr_arg ofList <\| congr_fun (List.filterMap_eq_map f) l #align multiset.filter_map_eq_map Multiset.filterMap_eq_map theorem filterMap_eq_filter : filterMap (Option.guard p) = filter p := funext fun s => Quot.inductionOn s fun l => congr_arg ofList <\| by rw [← List.filterMap_eq_filter] congr; funext a; simp #align multiset.filter_map_eq_filter Multiset.filterMap_eq_filter theorem filterMap_filterMap (f : α → Option β) (g : β → Option γ) (s : Multiset α) : filterMap g (filterMap f s) = filterMap (fun x => (f x).bind g) s := Quot.inductionOn s fun l => congr_arg ofList <\| List.filterMap_filterMap f g l #align multiset.filter_map_filter_map Multiset.filterMap_filterMap theorem map_filterMap (f : α → Option β) (g : β → γ) (s : Multiset α) : map g (filterMap f s) = filterMap (fun x => (f x).map g) s := Quot.inductionOn s fun l => congr_arg ofList <\| List.map_filterMap f g l #align multiset.map_filter_map Multiset.map_filterMap theorem filterMap_map (f : α → β) (g : β → Option γ) (s : Multiset α) : filterMap g (map f s) = filterMap (g ∘ f) s := Quot.inductionOn s fun l => congr_arg ofList <\| List.filterMap_map f g l #align multiset.filter_map_map Multiset.filterMap_map theorem filter_filterMap (f : α → Option β) (p : β → Prop) [DecidablePred p] (s : Multiset α) : filter p (filterMap f s) = filterMap (fun x => (f x).filter p) s := Quot.inductionOn s fun l => congr_arg ofList <\| List.filter_filterMap f p l #align multiset.filter_filter_map Multiset.filter_filterMap theorem filterMap_filter (f : α → Option β) (s : Multiset α) : filterMap f (filter p s) = filterMap (fun x => if p x then f x else none) s := Quot.inductionOn s fun l => congr_arg ofList <\| by simpa using List.filterMap_filter p f l #align multiset.filter_map_filter Multiset.filterMap_filter @[simp] theorem filterMap_some (s : Multiset α) : filterMap some s = s := Quot.inductionOn s fun l => congr_arg ofList <\| List.filterMap_some l #align multiset.filter_map_some Multiset.filterMap_some @[simp] theorem mem_filterMap (f : α → Option β) (s : Multiset α) {b : β} : b ∈ filterMap f s ↔ ∃ a, a ∈ s ∧ f a = some b := Quot.inductionOn s fun l => List.mem_filterMap f l #align multiset.mem_filter_map Multiset.mem_filterMap theorem map_filterMap_of_inv (f : α → Option β) (g : β → α) (H : ∀ x : α, (f x).map g = some x) (s : Multiset α) : map g (filterMap f s) = s := Quot.inductionOn s fun l => congr_arg ofList <\| List.map_filterMap_of_inv f g H l #align multiset.map_filter_map_of_inv Multiset.map_filterMap_of_inv theorem filterMap_le_filterMap (f : α → Option β) {s t : Multiset α} (h : s ≤ t) : filterMap f s ≤ filterMap f t := leInductionOn h fun h => (h.filterMap _).subperm #align multiset.filter_map_le_filter_map Multiset.filterMap_le_filterMap def countP (s : Multiset α) : ℕ := Quot.liftOn s (List.countP p) fun _l₁ _l₂ => Perm.countP_eq (p ·) #align multiset.countp Multiset.countP @[simp] theorem coe_countP (l : List α) : countP p l = l.countP p := rfl #align multiset.coe_countp Multiset.coe_countP @[simp] theorem countP_zero : countP p 0 = 0 := rfl #align multiset.countp_zero Multiset.countP_zero variable {p} @[simp] theorem countP_cons_of_pos {a : α} (s) : p a → countP p (a ::ₘ s) = countP p s + 1 := Quot.inductionOn s <\| by simpa using List.countP_cons_of_pos (p ·) #align multiset.countp_cons_of_pos Multiset.countP_cons_of_pos @[simp] theorem countP_cons_of_neg {a : α} (s) : ¬p a → countP p (a ::ₘ s) = countP p s := Quot.inductionOn s <\| by simpa using List.countP_cons_of_neg (p ·) #align multiset.countp_cons_of_neg Multiset.countP_cons_of_neg variable (p) theorem countP_cons (b : α) (s) : countP p (b ::ₘ s) = countP p s + if p b then 1 else 0 := Quot.inductionOn s <\| by simp [List.countP_cons] #align multiset.countp_cons Multiset.countP_cons theorem countP_eq_card_filter (s) : countP p s = card (filter p s) := Quot.inductionOn s fun l => l.countP_eq_length_filter (p ·) #align multiset.countp_eq_card_filter Multiset.countP_eq_card_filter theorem countP_le_card (s) : countP p s ≤ card s := Quot.inductionOn s fun _l => countP_le_length (p ·) #align multiset.countp_le_card Multiset.countP_le_card @[simp] theorem countP_add (s t) : countP p (s + t) = countP p s + countP p t := by simp [countP_eq_card_filter] #align multiset.countp_add Multiset.countP_add @[simp] theorem countP_nsmul (s) (n : ℕ) : countP p (n • s) = n countP p s := by induction n <;> simp [, succ_nsmul, succ_mul, zero_nsmul] #align multiset.countp_nsmul Multiset.countP_nsmul theorem card_eq_countP_add_countP (s) : card s = countP p s + countP (fun x => ¬p x) s := Quot.inductionOn s fun l => by simp [l.length_eq_countP_add_countP p] #align multiset.card_eq_countp_add_countp Multiset.card_eq_countP_add_countP def countPAddMonoidHom : Multiset α →+ ℕ where toFun := countP p map_zero' := countP_zero _ map_add' := countP_add _ #align multiset.countp_add_monoid_hom Multiset.countPAddMonoidHom @[simp] theorem coe_countPAddMonoidHom : (countPAddMonoidHom p : Multiset α → ℕ) = countP p := rfl #align multiset.coe_countp_add_monoid_hom Multiset.coe_countPAddMonoidHom @[simp] theorem countP_sub [DecidableEq α] {s t : Multiset α} (h : t ≤ s) : countP p (s - t) = countP p s - countP p t := by simp [countP_eq_card_filter, h, filter_le_filter] #align multiset.countp_sub Multiset.countP_sub theorem countP_le_of_le {s t} (h : s ≤ t) : countP p s ≤ countP p t := by simpa [countP_eq_card_filter] using card_le_card (filter_le_filter p h) #align multiset.countp_le_of_le Multiset.countP_le_of_le @[simp] theorem countP_filter (q) [DecidablePred q] (s : Multiset α) : countP p (filter q s) = countP (fun a => p a ∧ q a) s := by simp [countP_eq_card_filter] #align multiset.countp_filter Multiset.countP_filter theorem countP_eq_countP_filter_add (s) (p q : α → Prop) [DecidablePred p] [DecidablePred q] : countP p s = (filter q s).countP p + (filter (fun a => ¬q a) s).countP p := Quot.inductionOn s fun l => by convert l.countP_eq_countP_filter_add (p ·) (q ·) simp [countP_filter] #align multiset.countp_eq_countp_filter_add Multiset.countP_eq_countP_filter_add @[simp] theorem countP_True {s : Multiset α} : countP (fun _ => True) s = card s := Quot.inductionOn s fun _l => List.countP_true #align multiset.countp_true Multiset.countP_True @[simp] theorem countP_False {s : Multiset α} : countP (fun _ => False) s = 0 := Quot.inductionOn s fun _l => List.countP_false #align multiset.countp_false Multiset.countP_False theorem countP_map (f : α → β) (s : Multiset α) (p : β → Prop) [DecidablePred p] : countP p (map f s) = card (s.filter fun a => p (f a)) := by refine Multiset.induction_on s ?_ fun a t IH => ?_ · rw [map_zero, countP_zero, filter_zero, card_zero] · rw [map_cons, countP_cons, IH, filter_cons, card_add, apply_ite card, card_zero, card_singleton, add_comm] #align multiset.countp_map Multiset.countP_map -- Porting note: `Lean.Internal.coeM` forces us to type-ascript `{a // a ∈ s}` lemma countP_attach (s : Multiset α) : s.attach.countP (fun a : {a // a ∈ s} ↦ p a) = s.countP p := Quotient.inductionOn s fun l => by simp only [quot_mk_to_coe, coe_countP] -- Porting note: was -- rw [quot_mk_to_coe, coe_attach, coe_countP] -- exact List.countP_attach _ _ rw [coe_attach] refine (coe_countP _ _).trans ?_ convert List.countP_attach _ _ rfl #align multiset.countp_attach Multiset.countP_attach lemma filter_attach (s : Multiset α) (p : α → Prop) [DecidablePred p] : (s.attach.filter fun a : {a // a ∈ s} ↦ p ↑a) = (s.filter p).attach.map (Subtype.map id fun _ ↦ Multiset.mem_of_mem_filter) := Quotient.inductionOn s fun l ↦ congr_arg _ (List.filter_attach l p) #align multiset.filter_attach Multiset.filter_attach variable {p} theorem countP_pos {s} : 0 < countP p s ↔ ∃ a ∈ s, p a := Quot.inductionOn s fun _l => by simpa using List.countP_pos (p ·) #align multiset.countp_pos Multiset.countP_pos theorem countP_eq_zero {s} : countP p s = 0 ↔ ∀ a ∈ s, ¬p a := Quot.inductionOn s fun _l => by simp [List.countP_eq_zero] #align multiset.countp_eq_zero Multiset.countP_eq_zero theorem countP_eq_card {s} : countP p s = card s ↔ ∀ a ∈ s, p a := Quot.inductionOn s fun _l => by simp [List.countP_eq_length] #align multiset.countp_eq_card Multiset.countP_eq_card theorem countP_pos_of_mem {s a} (h : a ∈ s) (pa : p a) : 0 < countP p s := countP_pos.2 ⟨_, h, pa⟩ #align multiset.countp_pos_of_mem Multiset.countP_pos_of_mem theorem countP_congr {s s' : Multiset α} (hs : s = s') {p p' : α → Prop} [DecidablePred p] [DecidablePred p'] (hp : ∀ x ∈ s, p x = p' x) : s.countP p = s'.countP p' := by revert hs hp exact Quot.induction_on₂ s s' (fun l l' hs hp => by simp only [quot_mk_to_coe'', coe_eq_coe] at hs apply hs.countP_congr simpa using hp) #align multiset.countp_congr Multiset.countP_congr end section variable [DecidableEq α] {s : Multiset α} def count (a : α) : Multiset α → ℕ := countP (a = ·) #align multiset.count Multiset.count @[simp] theorem coe_count (a : α) (l : List α) : count a (ofList l) = l.count a := by simp_rw [count, List.count, coe_countP (a = ·) l, @eq_comm _ a] rfl #align multiset.coe_count Multiset.coe_count @[simp, nolint simpNF] -- Porting note (#10618): simp can prove this at EOF, but not right now theorem count_zero (a : α) : count a 0 = 0 := rfl #align multiset.count_zero Multiset.count_zero @[simp] theorem count_cons_self (a : α) (s : Multiset α) : count a (a ::ₘ s) = count a s + 1 := countP_cons_of_pos _ <\| rfl #align multiset.count_cons_self Multiset.count_cons_self @[simp] theorem count_cons_of_ne {a b : α} (h : a ≠ b) (s : Multiset α) : count a (b ::ₘ s) = count a s := countP_cons_of_neg _ <\| h #align multiset.count_cons_of_ne Multiset.count_cons_of_ne theorem count_le_card (a : α) (s) : count a s ≤ card s := countP_le_card _ _ #align multiset.count_le_card Multiset.count_le_card theorem count_le_of_le (a : α) {s t} : s ≤ t → count a s ≤ count a t := countP_le_of_le _ #align multiset.count_le_of_le Multiset.count_le_of_le theorem count_le_count_cons (a b : α) (s : Multiset α) : count a s ≤ count a (b ::ₘ s) := count_le_of_le _ (le_cons_self _ _) #align multiset.count_le_count_cons Multiset.count_le_count_cons theorem count_cons (a b : α) (s : Multiset α) : count a (b ::ₘ s) = count a s + if a = b then 1 else 0 := countP_cons (a = ·) _ _ #align multiset.count_cons Multiset.count_cons theorem count_singleton_self (a : α) : count a ({a} : Multiset α) = 1 := count_eq_one_of_mem (nodup_singleton a) <\| mem_singleton_self a #align multiset.count_singleton_self Multiset.count_singleton_self theorem count_singleton (a b : α) : count a ({b} : Multiset α) = if a = b then 1 else 0 := by simp only [count_cons, ← cons_zero, count_zero, zero_add] #align multiset.count_singleton Multiset.count_singleton @[simp] theorem count_add (a : α) : ∀ s t, count a (s + t) = count a s + count a t := countP_add _ #align multiset.count_add Multiset.count_add def countAddMonoidHom (a : α) : Multiset α →+ ℕ := countPAddMonoidHom (a = ·) #align multiset.count_add_monoid_hom Multiset.countAddMonoidHom @[simp] theorem coe_countAddMonoidHom {a : α} : (countAddMonoidHom a : Multiset α → ℕ) = count a := rfl #align multiset.coe_count_add_monoid_hom Multiset.coe_countAddMonoidHom @[simp] theorem count_nsmul (a : α) (n s) : count a (n • s) = n count a s := by induction n <;> simp [, succ_nsmul, succ_mul, zero_nsmul] #align multiset.count_nsmul Multiset.count_nsmul @[simp] lemma count_attach (a : {x // x ∈ s}) : s.attach.count a = s.count ↑a := Eq.trans (countP_congr rfl fun _ _ => by simp [Subtype.ext_iff]) <\| countP_attach _ _ #align multiset.count_attach Multiset.count_attach theorem count_pos {a : α} {s : Multiset α} : 0 < count a s ↔ a ∈ s := by simp [count, countP_pos] #align multiset.count_pos Multiset.count_pos theorem one_le_count_iff_mem {a : α} {s : Multiset α} : 1 ≤ count a s ↔ a ∈ s := by rw [succ_le_iff, count_pos] #align multiset.one_le_count_iff_mem Multiset.one_le_count_iff_mem @[simp] theorem count_eq_zero_of_not_mem {a : α} {s : Multiset α} (h : a ∉ s) : count a s = 0 := by_contradiction fun h' => h <\| count_pos.1 (Nat.pos_of_ne_zero h') #align multiset.count_eq_zero_of_not_mem Multiset.count_eq_zero_of_not_mem lemma count_ne_zero {a : α} : count a s ≠ 0 ↔ a ∈ s := Nat.pos_iff_ne_zero.symm.trans count_pos #align multiset.count_ne_zero Multiset.count_ne_zero @[simp] lemma count_eq_zero {a : α} : count a s = 0 ↔ a ∉ s := count_ne_zero.not_right #align multiset.count_eq_zero Multiset.count_eq_zero theorem count_eq_card {a : α} {s} : count a s = card s ↔ ∀ x ∈ s, a = x := by simp [countP_eq_card, count, @eq_comm _ a] #align multiset.count_eq_card Multiset.count_eq_card @[simp] theorem count_replicate_self (a : α) (n : ℕ) : count a (replicate n a) = n := by convert List.count_replicate_self a n rw [← coe_count, coe_replicate] #align multiset.count_replicate_self Multiset.count_replicate_self theorem count_replicate (a b : α) (n : ℕ) : count a (replicate n b) = if a = b then n else 0 := by convert List.count_replicate a b n rw [← coe_count, coe_replicate] #align multiset.count_replicate Multiset.count_replicate @[simp] theorem count_erase_self (a : α) (s : Multiset α) : count a (erase s a) = count a s - 1 := Quotient.inductionOn s fun l => by convert List.count_erase_self a l <;> rw [← coe_count] <;> simp #align multiset.count_erase_self Multiset.count_erase_self @[simp] theorem count_erase_of_ne {a b : α} (ab : a ≠ b) (s : Multiset α) : count a (erase s b) = count a s := Quotient.inductionOn s fun l => by convert List.count_erase_of_ne ab l <;> rw [← coe_count] <;> simp #align multiset.count_erase_of_ne Multiset.count_erase_of_ne @[simp] theorem count_sub (a : α) (s t : Multiset α) : count a (s - t) = count a s - count a t := by revert s; refine Multiset.induction_on t (by simp) fun b t IH s => ?_ rw [sub_cons, IH] rcases Decidable.eq_or_ne a b with rfl \| ab · rw [count_erase_self, count_cons_self, Nat.sub_sub, add_comm] · rw [count_erase_of_ne ab, count_cons_of_ne ab] #align multiset.count_sub Multiset.count_sub @[simp] theorem count_union (a : α) (s t : Multiset α) : count a (s ∪ t) = max (count a s) (count a t) := by simp [(· ∪ ·), union, Nat.sub_add_eq_max] #align multiset.count_union Multiset.count_union @[simp] theorem count_inter (a : α) (s t : Multiset α) : count a (s ∩ t) = min (count a s) (count a t) := by apply @Nat.add_left_cancel (count a (s - t)) rw [← count_add, sub_add_inter, count_sub, Nat.sub_add_min_cancel] #align multiset.count_inter Multiset.count_inter theorem le_count_iff_replicate_le {a : α} {s : Multiset α} {n : ℕ} : n ≤ count a s ↔ replicate n a ≤ s := Quot.inductionOn s fun _l => by simp only [quot_mk_to_coe'', mem_coe, coe_count] exact le_count_iff_replicate_sublist.trans replicate_le_coe.symm #align multiset.le_count_iff_replicate_le Multiset.le_count_iff_replicate_le @[simp] theorem count_filter_of_pos {p} [DecidablePred p] {a} {s : Multiset α} (h : p a) : count a (filter p s) = count a s := Quot.inductionOn s fun _l => by simp only [quot_mk_to_coe'', filter_coe, mem_coe, coe_count, decide_eq_true_eq] apply count_filter simpa using h #align multiset.count_filter_of_pos Multiset.count_filter_of_pos @[simp] theorem count_filter_of_neg {p} [DecidablePred p] {a} {s : Multiset α} (h : ¬p a) : count a (filter p s) = 0 := Multiset.count_eq_zero_of_not_mem fun t => h (of_mem_filter t) #align multiset.count_filter_of_neg Multiset.count_filter_of_neg theorem count_filter {p} [DecidablePred p] {a} {s : Multiset α} : count a (filter p s) = if p a then count a s else 0 := by split_ifs with h · exact count_filter_of_pos h · exact count_filter_of_neg h #align multiset.count_filter Multiset.count_filter theorem ext {s t : Multiset α} : s = t ↔ ∀ a, count a s = count a t := Quotient.inductionOn₂ s t fun _l₁ _l₂ => Quotient.eq.trans <\| by simp only [quot_mk_to_coe, filter_coe, mem_coe, coe_count, decide_eq_true_eq] apply perm_iff_count #align multiset.ext Multiset.ext @[ext] theorem ext' {s t : Multiset α} : (∀ a, count a s = count a t) → s = t := ext.2 #align multiset.ext' Multiset.ext' @[simp] theorem coe_inter (s t : List α) : (s ∩ t : Multiset α) = (s.bagInter t : List α) := by ext; simp #align multiset.coe_inter Multiset.coe_inter theorem le_iff_count {s t : Multiset α} : s ≤ t ↔ ∀ a, count a s ≤ count a t := ⟨fun h a => count_le_of_le a h, fun al => by rw [← (ext.2 fun a => by simp [max_eq_right (al a)] : s ∪ t = t)]; apply le_union_left⟩ #align multiset.le_iff_count Multiset.le_iff_count instance : DistribLattice (Multiset α) := { le_sup_inf := fun s t u => le_of_eq <\| Eq.symm <\| ext.2 fun a => by simp only [max_min_distrib_left, Multiset.count_inter, Multiset.sup_eq_union, Multiset.count_union, Multiset.inf_eq_inter] } theorem count_map {α β : Type} (f : α → β) (s : Multiset α) [DecidableEq β] (b : β) : count b (map f s) = card (s.filter fun a => b = f a) := by simp [Bool.beq_eq_decide_eq, eq_comm, count, countP_map] #align multiset.count_map Multiset.count_map theorem count_map_eq_count [DecidableEq β] (f : α → β) (s : Multiset α) (hf : Set.InjOn f { x : α \| x ∈ s }) (x) (H : x ∈ s) : (s.map f).count (f x) = s.count x := by suffices (filter (fun a : α => f x = f a) s).count x = card (filter (fun a : α => f x = f a) s) by rw [count, countP_map, ← this] exact count_filter_of_pos <\| rfl · rw [eq_replicate_card.2 fun b hb => (hf H (mem_filter.1 hb).left _).symm] · simp only [count_replicate, eq_self_iff_true, if_true, card_replicate] · simp only [mem_filter, beq_iff_eq, and_imp, @eq_comm _ (f x), imp_self, implies_true] #align multiset.count_map_eq_count Multiset.count_map_eq_count theorem count_map_eq_count' [DecidableEq β] (f : α → β) (s : Multiset α) (hf : Function.Injective f) (x : α) : (s.map f).count (f x) = s.count x := by by_cases H : x ∈ s · exact count_map_eq_count f _ hf.injOn _ H · rw [count_eq_zero_of_not_mem H, count_eq_zero, mem_map] rintro ⟨k, hks, hkx⟩ rw [hf hkx] at hks contradiction #align multiset.count_map_eq_count' Multiset.count_map_eq_count' @[simp] theorem sub_filter_eq_filter_not [DecidableEq α] (p) [DecidablePred p] (s : Multiset α) : s - s.filter p = s.filter (fun a ↦ ¬ p a) := by ext a; by_cases h : p a <;> simp [h] theorem filter_eq' (s : Multiset α) (b : α) : s.filter (· = b) = replicate (count b s) b := Quotient.inductionOn s fun l => by simp only [quot_mk_to_coe, filter_coe, mem_coe, coe_count] rw [List.filter_eq l b, coe_replicate] #align multiset.filter_eq' Multiset.filter_eq' theorem filter_eq (s : Multiset α) (b : α) : s.filter (Eq b) = replicate (count b s) b := by simp_rw [← filter_eq', eq_comm] #align multiset.filter_eq Multiset.filter_eq @[simp] theorem replicate_inter (n : ℕ) (x : α) (s : Multiset α) : replicate n x ∩ s = replicate (min n (s.count x)) x := by ext y rw [count_inter, count_replicate, count_replicate] by_cases h : y = x · simp only [h, if_true] · simp only [h, if_false, Nat.zero_min] #align multiset.replicate_inter Multiset.replicate_inter @[simp] theorem inter_replicate (s : Multiset α) (n : ℕ) (x : α) : s ∩ replicate n x = replicate (min (s.count x) n) x := by rw [inter_comm, replicate_inter, min_comm] #align multiset.inter_replicate Multiset.inter_replicate theorem erase_attach_map_val (s : Multiset α) (x : {x // x ∈ s}) : (s.attach.erase x).map (↑) = s.erase x := by rw [Multiset.map_erase _ val_injective, attach_map_val] theorem erase_attach_map (s : Multiset α) (f : α → β) (x : {x // x ∈ s}) : (s.attach.erase x).map (fun j : {x // x ∈ s} ↦ f j) = (s.erase x).map f := by simp only [← Function.comp_apply (f := f)] rw [← map_map, erase_attach_map_val] end @[ext] theorem addHom_ext [AddZeroClass β] ⦃f g : Multiset α →+ β⦄ (h : ∀ x, f {x} = g {x}) : f = g := by ext s induction' s using Multiset.induction_on with a s ih · simp only [_root_.map_zero] · simp only [← singleton_add, _root_.map_add, ih, h] #align multiset.add_hom_ext Multiset.addHom_ext	Mathlib/Data/Multiset/Basic.lean	2,723	2,724	theorem count_eq_card_filter_eq [DecidableEq α] (s : Multiset α) (a : α) : s.count a = card (s.filter (a = ·)) := by	rw [count, countP_eq_card_filter]
import Mathlib.Algebra.Polynomial.RingDivision import Mathlib.RingTheory.Polynomial.Nilpotent open scoped Classical Polynomial open Polynomial noncomputable section	Mathlib/RingTheory/Polynomial/IrreducibleRing.lean	37	61	theorem Polynomial.Monic.irreducible_of_irreducible_map_of_isPrime_nilradical {R S : Type} [CommRing R] [(nilradical R).IsPrime] [CommRing S] [IsDomain S] (φ : R →+ S) (f : R[X]) (hm : f.Monic) (hi : Irreducible (f.map φ)) : Irreducible f := by	let R' := R ⧸ nilradical R let ψ : R' →+* S := Ideal.Quotient.lift (nilradical R) φ (haveI := RingHom.ker_isPrime φ; nilradical_le_prime (RingHom.ker φ)) let ι := algebraMap R R' rw [show φ = ψ.comp ι from rfl, ← map_map] at hi replace hi := hm.map ι \|>.irreducible_of_irreducible_map _ _ hi refine ⟨fun h ↦ hi.1 <\| (mapRingHom ι).isUnit_map h, fun a b h ↦ ?_⟩ wlog hb : IsUnit (b.map ι) generalizing a b · exact (this b a (mul_comm a b ▸ h) (hi.2 _ _ (by rw [h, Polynomial.map_mul]) \|>.resolve_right hb)).symm have hn (i : ℕ) (hi : i ≠ 0) : IsNilpotent (b.coeff i) := by obtain ⟨_, _, h⟩ := Polynomial.isUnit_iff.1 hb simpa only [coeff_map, coeff_C, hi, ite_false, ← RingHom.mem_ker, show RingHom.ker ι = nilradical R from Ideal.mk_ker] using congr(coeff $(h.symm) i) refine .inr <\| isUnit_of_coeff_isUnit_isNilpotent (isUnit_of_mul_isUnit_right (x := a.coeff f.natDegree) <\| (IsUnit.neg_iff _).1 ?_) hn have hc : f.leadingCoeff = _ := congr(coeff $h f.natDegree) rw [hm, coeff_mul, Finset.Nat.sum_antidiagonal_eq_sum_range_succ fun i j ↦ a.coeff i * b.coeff j, Finset.sum_range_succ, ← sub_eq_iff_eq_add, Nat.sub_self] at hc rw [← add_sub_cancel_left 1 (-(_ * _)), ← sub_eq_add_neg, hc] exact IsNilpotent.isUnit_sub_one <\| show _ ∈ nilradical R from sum_mem fun i hi ↦ Ideal.mul_mem_left _ _ <\| hn _ <\| Nat.sub_ne_zero_of_lt (List.mem_range.1 hi)
import Mathlib.MeasureTheory.Measure.NullMeasurable import Mathlib.MeasureTheory.MeasurableSpace.Basic import Mathlib.Topology.Algebra.Order.LiminfLimsup #align_import measure_theory.measure.measure_space from "leanprover-community/mathlib"@"343e80208d29d2d15f8050b929aa50fe4ce71b55" noncomputable section open Set open Filter hiding map open Function MeasurableSpace open scoped Classical symmDiff open Topology Filter ENNReal NNReal Interval MeasureTheory 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⟩⟩ #align measure_theory.ae_is_measurably_generated MeasureTheory.ae_isMeasurablyGenerated 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] #align measure_theory.ae_uIoc_iff MeasureTheory.ae_uIoc_iff theorem measure_union (hd : Disjoint s₁ s₂) (h : MeasurableSet s₂) : μ (s₁ ∪ s₂) = μ s₁ + μ s₂ := measure_union₀ h.nullMeasurableSet hd.aedisjoint #align measure_theory.measure_union MeasureTheory.measure_union theorem measure_union' (hd : Disjoint s₁ s₂) (h : MeasurableSet s₁) : μ (s₁ ∪ s₂) = μ s₁ + μ s₂ := measure_union₀' h.nullMeasurableSet hd.aedisjoint #align measure_theory.measure_union' MeasureTheory.measure_union' 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 #align measure_theory.measure_inter_add_diff MeasureTheory.measure_inter_add_diff 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) #align measure_theory.measure_diff_add_inter MeasureTheory.measure_diff_add_inter 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 #align measure_theory.measure_union_add_inter MeasureTheory.measure_union_add_inter 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] #align measure_theory.measure_union_add_inter' MeasureTheory.measure_union_add_inter' lemma measure_symmDiff_eq (hs : MeasurableSet s) (ht : MeasurableSet t) : μ (s ∆ t) = μ (s \ t) + μ (t \ s) := by simpa only [symmDiff_def, sup_eq_union] using measure_union disjoint_sdiff_sdiff (ht.diff hs) 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_add_measure_compl (h : MeasurableSet s) : μ s + μ sᶜ = μ univ := measure_add_measure_compl₀ h.nullMeasurableSet #align measure_theory.measure_add_measure_compl MeasureTheory.measure_add_measure_compl 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 #align measure_theory.measure_bUnion₀ MeasureTheory.measure_biUnion₀ 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 #align measure_theory.measure_bUnion MeasureTheory.measure_biUnion 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] #align measure_theory.measure_sUnion₀ MeasureTheory.measure_sUnion₀ 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] #align measure_theory.measure_sUnion MeasureTheory.measure_sUnion 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 #align measure_theory.measure_bUnion_finset₀ MeasureTheory.measure_biUnion_finset₀ 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 #align measure_theory.measure_bUnion_finset MeasureTheory.measure_biUnion_finset 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 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)) #align measure_theory.tsum_meas_le_meas_Union_of_disjoint MeasureTheory.tsum_meas_le_meas_iUnion_of_disjoint 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] #align measure_theory.tsum_measure_preimage_singleton MeasureTheory.tsum_measure_preimage_singleton 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] 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] #align measure_theory.sum_measure_preimage_singleton MeasureTheory.sum_measure_preimage_singleton theorem measure_diff_null' (h : μ (s₁ ∩ s₂) = 0) : μ (s₁ \ s₂) = μ s₁ := measure_congr <\| diff_ae_eq_self.2 h #align measure_theory.measure_diff_null' MeasureTheory.measure_diff_null' theorem measure_add_diff (hs : MeasurableSet s) (t : Set α) : μ s + μ (t \ s) = μ (s ∪ t) := by rw [← measure_union' disjoint_sdiff_right hs, union_diff_self] #align measure_theory.measure_add_diff MeasureTheory.measure_add_diff theorem measure_diff' (s : Set α) (hm : MeasurableSet t) (h_fin : μ t ≠ ∞) : μ (s \ t) = μ (s ∪ t) - μ t := Eq.symm <\| ENNReal.sub_eq_of_add_eq h_fin <\| by rw [add_comm, measure_add_diff hm, union_comm] #align measure_theory.measure_diff' MeasureTheory.measure_diff' theorem measure_diff (h : s₂ ⊆ s₁) (h₂ : MeasurableSet s₂) (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] #align measure_theory.measure_diff MeasureTheory.measure_diff 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 #align measure_theory.le_measure_diff MeasureTheory.le_measure_diff 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 := (WithTop.sub_eq_top_iff.2 ⟨hμu, hμv⟩).symm _ ≤ μ (u \ v) := le_measure_diff _ ≤ μ (u \ v ∪ v \ u) := measure_mono subset_union_left 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 : MeasurableSet s) (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 #align measure_theory.measure_diff_lt_of_lt_add MeasureTheory.measure_diff_lt_of_lt_add theorem measure_diff_le_iff_le_add (hs : MeasurableSet s) (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] #align measure_theory.measure_diff_le_iff_le_add MeasureTheory.measure_diff_le_iff_le_add 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) #align measure_theory.measure_eq_measure_of_null_diff MeasureTheory.measure_eq_measure_of_null_diff 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)⟩ #align measure_theory.measure_eq_measure_of_between_null_diff MeasureTheory.measure_eq_measure_of_between_null_diff 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 #align measure_theory.measure_eq_measure_smaller_of_between_null_diff MeasureTheory.measure_eq_measure_smaller_of_between_null_diff 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 #align measure_theory.measure_eq_measure_larger_of_between_null_diff MeasureTheory.measure_eq_measure_larger_of_between_null_diff 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 #align measure_theory.measure_compl MeasureTheory.measure_compl 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⟩⟩ #align measure_theory.union_ae_eq_left_iff_ae_subset MeasureTheory.union_ae_eq_left_iff_ae_subset @[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] #align measure_theory.union_ae_eq_right_iff_ae_subset MeasureTheory.union_ae_eq_right_iff_ae_subset theorem ae_eq_of_ae_subset_of_measure_ge (h₁ : s ≤ᵐ[μ] t) (h₂ : μ t ≤ μ s) (hsm : MeasurableSet s) (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] #align measure_theory.ae_eq_of_ae_subset_of_measure_ge MeasureTheory.ae_eq_of_ae_subset_of_measure_ge theorem ae_eq_of_subset_of_measure_ge (h₁ : s ⊆ t) (h₂ : μ t ≤ μ s) (hsm : MeasurableSet s) (ht : μ t ≠ ∞) : s =ᵐ[μ] t := ae_eq_of_ae_subset_of_measure_ge (HasSubset.Subset.eventuallyLE h₁) h₂ hsm ht #align measure_theory.ae_eq_of_subset_of_measure_ge MeasureTheory.ae_eq_of_subset_of_measure_ge theorem measure_iUnion_congr_of_subset [Countable β] {s : β → Set α} {t : β → Set α} (hsub : ∀ b, s b ⊆ t b) (h_le : ∀ b, μ (t b) ≤ μ (s b)) : μ (⋃ b, s b) = μ (⋃ b, t b) := by rcases Classical.em (∃ b, μ (t b) = ∞) with (⟨b, hb⟩ \| htop) · calc μ (⋃ b, s b) = ∞ := top_unique (hb ▸ (h_le b).trans <\| measure_mono <\| subset_iUnion _ _) _ = μ (⋃ b, t b) := Eq.symm <\| top_unique <\| hb ▸ measure_mono (subset_iUnion _ _) push_neg at htop refine le_antisymm (measure_mono (iUnion_mono hsub)) ?_ 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 _ _) · exact (measurableSet_toMeasurable _ _).inter (measurableSet_toMeasurable _ _) · 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 _ #align measure_theory.measure_Union_congr_of_subset MeasureTheory.measure_iUnion_congr_of_subset 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⟩) #align measure_theory.measure_union_congr_of_subset MeasureTheory.measure_union_congr_of_subset @[simp] theorem measure_iUnion_toMeasurable [Countable β] (s : β → Set α) : μ (⋃ b, toMeasurable μ (s b)) = μ (⋃ b, s b) := Eq.symm <\| measure_iUnion_congr_of_subset (fun _b => subset_toMeasurable _ _) fun _b => (measure_toMeasurable _).le #align measure_theory.measure_Union_to_measurable MeasureTheory.measure_iUnion_toMeasurable 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] #align measure_theory.measure_bUnion_to_measurable MeasureTheory.measure_biUnion_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 #align measure_theory.measure_to_measurable_union MeasureTheory.measure_toMeasurable_union @[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 #align measure_theory.measure_union_to_measurable MeasureTheory.measure_union_toMeasurable theorem sum_measure_le_measure_univ {s : Finset ι} {t : ι → Set α} (h : ∀ i ∈ s, MeasurableSet (t i)) (H : Set.PairwiseDisjoint (↑s) t) : (∑ i ∈ s, μ (t i)) ≤ μ (univ : Set α) := by rw [← measure_biUnion_finset H h] exact measure_mono (subset_univ _) #align measure_theory.sum_measure_le_measure_univ MeasureTheory.sum_measure_le_measure_univ theorem tsum_measure_le_measure_univ {s : ι → Set α} (hs : ∀ i, MeasurableSet (s i)) (H : Pairwise (Disjoint 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 #align measure_theory.tsum_measure_le_measure_univ MeasureTheory.tsum_measure_le_measure_univ theorem exists_nonempty_inter_of_measure_univ_lt_tsum_measure {m : MeasurableSpace α} (μ : Measure α) {s : ι → Set α} (hs : ∀ i, MeasurableSet (s i)) (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) #align measure_theory.exists_nonempty_inter_of_measure_univ_lt_tsum_measure MeasureTheory.exists_nonempty_inter_of_measure_univ_lt_tsum_measure 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, MeasurableSet (t i)) (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) #align measure_theory.exists_nonempty_inter_of_measure_univ_lt_sum_measure MeasureTheory.exists_nonempty_inter_of_measure_univ_lt_sum_measure 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) #align measure_theory.nonempty_inter_of_measure_lt_add MeasureTheory.nonempty_inter_of_measure_lt_add 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 #align measure_theory.nonempty_inter_of_measure_lt_add' MeasureTheory.nonempty_inter_of_measure_lt_add' theorem measure_iUnion_eq_iSup [Countable ι] {s : ι → Set α} (hd : Directed (· ⊆ ·) s) : μ (⋃ i, s i) = ⨆ i, μ (s i) := by cases nonempty_encodable ι -- WLOG, `ι = ℕ` generalize ht : Function.extend Encodable.encode s ⊥ = t replace hd : Directed (· ⊆ ·) t := ht ▸ hd.extend_bot Encodable.encode_injective suffices μ (⋃ n, t n) = ⨆ n, μ (t n) by simp only [← ht, Function.apply_extend μ, ← iSup_eq_iUnion, iSup_extend_bot Encodable.encode_injective, (· ∘ ·), Pi.bot_apply, bot_eq_empty, measure_empty] at this exact this.trans (iSup_extend_bot Encodable.encode_injective _) 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) := MeasurableSet.disjointed fun n => measurableSet_toMeasurable _ _ calc μ (⋃ n, t n) ≤ μ (⋃ n, T n) := measure_mono (iUnion_mono fun i => subset_toMeasurable _ _) _ = μ (⋃ n, Td n) := by rw [iUnion_disjointed] _ ≤ ∑' 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 #align measure_theory.measure_Union_eq_supr MeasureTheory.measure_iUnion_eq_iSup theorem measure_iUnion_eq_iSup' {α ι : Type} [MeasurableSpace α] {μ : Measure α} [Countable ι] [Preorder ι] [IsDirected ι (· ≤ ·)] {f : ι → Set α} : μ (⋃ i, f i) = ⨆ i, μ (Accumulate f i) := by have hd : Directed (· ⊆ ·) (Accumulate f) := by intro i j rcases directed_of (· ≤ ·) i j with ⟨k, rik, rjk⟩ exact ⟨k, biUnion_subset_biUnion_left fun l rli ↦ le_trans rli rik, biUnion_subset_biUnion_left fun l rlj ↦ le_trans rlj rjk⟩ rw [← iUnion_accumulate] exact measure_iUnion_eq_iSup hd 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.toEncodable rw [biUnion_eq_iUnion, measure_iUnion_eq_iSup hd.directed_val, ← iSup_subtype''] #align measure_theory.measure_bUnion_eq_supr MeasureTheory.measure_biUnion_eq_iSup theorem measure_iInter_eq_iInf [Countable ι] {s : ι → Set α} (h : ∀ i, MeasurableSet (s i)) (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 _ k), ENNReal.sub_iInf, ← ENNReal.sub_sub_cancel hk (measure_mono (iInter_subset _ k)), ← measure_diff (iInter_subset _ k) (MeasurableSet.iInter h) (this _ (iInter_subset _ k)), diff_iInter, measure_iUnion_eq_iSup] · congr 1 refine le_antisymm (iSup_mono' fun i => ?_) (iSup_mono fun i => ?_) · rcases hd i k with ⟨j, hji, hjk⟩ use j rw [← measure_diff hjk (h _) (this _ hjk)] gcongr · rw [tsub_le_iff_right, ← measure_union, Set.union_comm] · exact measure_mono (diff_subset_iff.1 Subset.rfl) · apply disjoint_sdiff_left · apply h i · exact hd.mono_comp _ fun _ _ => diff_subset_diff_right #align measure_theory.measure_Inter_eq_infi MeasureTheory.measure_iInter_eq_iInf theorem measure_iInter_eq_iInf' {α ι : Type} [MeasurableSpace α] {μ : Measure α} [Countable ι] [Preorder ι] [IsDirected ι (· ≤ ·)] {f : ι → Set α} (h : ∀ i, MeasurableSet (f i)) (hfin : ∃ i, μ (f i) ≠ ∞) : μ (⋂ i, f i) = ⨅ i, μ (⋂ j ≤ i, f j) := by let s := fun i ↦ ⋂ j ≤ i, f j have iInter_eq : ⋂ i, f i = ⋂ i, s i := by ext x; simp [s]; constructor · exact fun h _ j _ ↦ h j · intro h i rcases directed_of (· ≤ ·) i i with ⟨j, rij, -⟩ exact h j i rij have ms : ∀ i, MeasurableSet (s i) := fun i ↦ MeasurableSet.biInter (countable_univ.mono <\| subset_univ _) fun i _ ↦ h i have hd : Directed (· ⊇ ·) s := by intro i j rcases directed_of (· ≤ ·) i j with ⟨k, rik, rjk⟩ exact ⟨k, biInter_subset_biInter_left fun j rji ↦ le_trans rji rik, biInter_subset_biInter_left fun i rij ↦ le_trans rij rjk⟩ have hfin' : ∃ i, μ (s i) ≠ ∞ := by rcases hfin with ⟨i, hi⟩ rcases directed_of (· ≤ ·) i i with ⟨j, rij, -⟩ exact ⟨j, ne_top_of_le_ne_top hi <\| measure_mono <\| biInter_subset_of_mem rij⟩ exact iInter_eq ▸ measure_iInter_eq_iInf ms hd hfin' theorem tendsto_measure_iUnion [Preorder ι] [IsDirected ι (· ≤ ·)] [Countable ι] {s : ι → Set α} (hm : Monotone s) : Tendsto (μ ∘ s) atTop (𝓝 (μ (⋃ n, s n))) := by rw [measure_iUnion_eq_iSup hm.directed_le] exact tendsto_atTop_iSup fun n m hnm => measure_mono <\| hm hnm #align measure_theory.tendsto_measure_Union MeasureTheory.tendsto_measure_iUnion theorem tendsto_measure_iUnion' {α ι : Type} [MeasurableSpace α] {μ : Measure α} [Countable ι] [Preorder ι] [IsDirected ι (· ≤ ·)] {f : ι → Set α} : Tendsto (fun i ↦ μ (Accumulate f i)) atTop (𝓝 (μ (⋃ i, f i))) := by rw [measure_iUnion_eq_iSup'] exact tendsto_atTop_iSup fun i j hij ↦ by gcongr theorem tendsto_measure_iInter [Countable ι] [Preorder ι] [IsDirected ι (· ≤ ·)] {s : ι → Set α} (hs : ∀ n, MeasurableSet (s n)) (hm : Antitone s) (hf : ∃ i, μ (s i) ≠ ∞) : Tendsto (μ ∘ s) atTop (𝓝 (μ (⋂ n, s n))) := by rw [measure_iInter_eq_iInf hs hm.directed_ge hf] exact tendsto_atTop_iInf fun n m hnm => measure_mono <\| hm hnm #align measure_theory.tendsto_measure_Inter MeasureTheory.tendsto_measure_iInter theorem tendsto_measure_iInter' {α ι : Type} [MeasurableSpace α] {μ : Measure α} [Countable ι] [Preorder ι] [IsDirected ι (· ≤ ·)] {f : ι → Set α} (hm : ∀ i, MeasurableSet (f i)) (hf : ∃ i, μ (f i) ≠ ∞) : Tendsto (fun i ↦ μ (⋂ j ∈ {j \| j ≤ i}, f j)) atTop (𝓝 (μ (⋂ i, f i))) := by rw [measure_iInter_eq_iInf' hm hf] exact tendsto_atTop_iInf fun i j hij ↦ measure_mono <\| biInter_subset_biInter_left fun k hki ↦ le_trans hki hij 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, MeasurableSet (s r)) (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 refine tendsto_order.2 ⟨fun l hl => ?_, fun L hL => ?_⟩ · filter_upwards [self_mem_nhdsWithin (s := Ioi a)] with r hr using hl.trans_le (measure_mono (biInter_subset_of_mem hr)) obtain ⟨u, u_anti, u_pos, u_lim⟩ : ∃ u : ℕ → ι, StrictAnti u ∧ (∀ n : ℕ, a < u n) ∧ Tendsto u atTop (𝓝 a) := by rcases hf with ⟨r, ar, _⟩ rcases exists_seq_strictAnti_tendsto' ar with ⟨w, w_anti, w_mem, w_lim⟩ exact ⟨w, w_anti, fun n => (w_mem n).1, w_lim⟩ have A : Tendsto (μ ∘ s ∘ u) atTop (𝓝 (μ (⋂ n, s (u n)))) := by refine tendsto_measure_iInter (fun n => hs _ (u_pos n)) ?_ ?_ · intro m n hmn exact hm _ _ (u_pos n) (u_anti.antitone hmn) · rcases hf with ⟨r, rpos, hr⟩ obtain ⟨n, hn⟩ : ∃ n : ℕ, u n < r := ((tendsto_order.1 u_lim).2 r rpos).exists refine ⟨n, ne_of_lt (lt_of_le_of_lt ?_ hr.lt_top)⟩ exact measure_mono (hm _ _ (u_pos n) hn.le) have B : ⋂ n, s (u n) = ⋂ r > a, s r := by apply Subset.antisymm · simp only [subset_iInter_iff, gt_iff_lt] intro r rpos obtain ⟨n, hn⟩ : ∃ n, u n < r := ((tendsto_order.1 u_lim).2 _ rpos).exists exact Subset.trans (iInter_subset _ n) (hm (u n) r (u_pos n) hn.le) · simp only [subset_iInter_iff, gt_iff_lt] intro n apply biInter_subset_of_mem exact u_pos n rw [B] at A obtain ⟨n, hn⟩ : ∃ n, μ (s (u n)) < L := ((tendsto_order.1 A).2 _ hL).exists have : Ioc a (u n) ∈ 𝓝[>] a := Ioc_mem_nhdsWithin_Ioi ⟨le_rfl, u_pos n⟩ filter_upwards [this] with r hr using lt_of_le_of_lt (measure_mono (hm _ _ hr.1 hr.2)) hn #align measure_theory.tendsto_measure_bInter_gt MeasureTheory.tendsto_measure_biInter_gt theorem measure_limsup_eq_zero {s : ℕ → Set α} (hs : (∑' i, μ (s i)) ≠ ∞) : μ (limsup s atTop) = 0 := by -- First we replace the sequence `sₙ` with a sequence of measurable sets `tₙ ⊇ sₙ` of the same -- measure. set t : ℕ → Set α := fun n => toMeasurable μ (s n) have ht : (∑' i, μ (t i)) ≠ ∞ := by simpa only [t, measure_toMeasurable] using hs suffices μ (limsup t atTop) = 0 by have A : s ≤ t := fun n => subset_toMeasurable μ (s n) -- TODO default args fail exact measure_mono_null (limsup_le_limsup (eventually_of_forall (Pi.le_def.mp A))) this -- Next we unfold `limsup` for sets and replace equality with an inequality simp only [limsup_eq_iInf_iSup_of_nat', Set.iInf_eq_iInter, Set.iSup_eq_iUnion, ← nonpos_iff_eq_zero] -- Finally, we estimate `μ (⋃ i, t (i + n))` by `∑ i', μ (t (i + n))` refine le_of_tendsto_of_tendsto' (tendsto_measure_iInter (fun i => MeasurableSet.iUnion fun b => measurableSet_toMeasurable _ _) ?_ ⟨0, ne_top_of_le_ne_top ht (measure_iUnion_le t)⟩) (ENNReal.tendsto_sum_nat_add (μ ∘ t) ht) fun n => measure_iUnion_le _ intro n m hnm x simp only [Set.mem_iUnion] exact fun ⟨i, hi⟩ => ⟨i + (m - n), by simpa only [add_assoc, tsub_add_cancel_of_le hnm] using hi⟩ #align measure_theory.measure_limsup_eq_zero MeasureTheory.measure_limsup_eq_zero theorem measure_liminf_eq_zero {s : ℕ → Set α} (h : (∑' i, μ (s i)) ≠ ∞) : μ (liminf s atTop) = 0 := by rw [← le_zero_iff] have : liminf s atTop ≤ limsup s atTop := liminf_le_limsup exact (μ.mono this).trans (by simp [measure_limsup_eq_zero h]) #align measure_theory.measure_liminf_eq_zero MeasureTheory.measure_liminf_eq_zero -- Need to specify `α := Set α` below because of diamond; see #19041 theorem limsup_ae_eq_of_forall_ae_eq (s : ℕ → Set α) {t : Set α} (h : ∀ n, s n =ᵐ[μ] t) : limsup (α := Set α) s atTop =ᵐ[μ] t := by simp_rw [ae_eq_set] at h ⊢ constructor · rw [atTop.limsup_sdiff s t] apply measure_limsup_eq_zero simp [h] · rw [atTop.sdiff_limsup s t] apply measure_liminf_eq_zero simp [h] #align measure_theory.limsup_ae_eq_of_forall_ae_eq MeasureTheory.limsup_ae_eq_of_forall_ae_eq -- Need to specify `α := Set α` above because of diamond; see #19041 theorem liminf_ae_eq_of_forall_ae_eq (s : ℕ → Set α) {t : Set α} (h : ∀ n, s n =ᵐ[μ] t) : liminf (α := Set α) s atTop =ᵐ[μ] t := by simp_rw [ae_eq_set] at h ⊢ constructor · rw [atTop.liminf_sdiff s t] apply measure_liminf_eq_zero simp [h] · rw [atTop.sdiff_liminf s t] apply measure_limsup_eq_zero simp [h] #align measure_theory.liminf_ae_eq_of_forall_ae_eq MeasureTheory.liminf_ae_eq_of_forall_ae_eq theorem measure_if {x : β} {t : Set β} {s : Set α} : μ (if x ∈ t then s else ∅) = indicator t (fun _ => μ s) x := by split_ifs with h <;> simp [h] #align measure_theory.measure_if MeasureTheory.measure_if end section variable {m0 : MeasurableSpace α} [MeasurableSpace β] [MeasurableSpace γ] variable {μ μ₁ μ₂ μ₃ ν ν' ν₁ ν₂ : Measure α} {s s' t : Set α} namespace Measure 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 #align measure_theory.measure.measure_inter_eq_of_measure_eq MeasureTheory.Measure.measure_inter_eq_of_measure_eq 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 #align measure_theory.measure.measure_to_measurable_inter MeasureTheory.Measure.measure_toMeasurable_inter instance instZero [MeasurableSpace α] : Zero (Measure α) := ⟨{ toOuterMeasure := 0 m_iUnion := fun _f _hf _hd => tsum_zero.symm trim_le := OuterMeasure.trim_zero.le }⟩ #align measure_theory.measure.has_zero MeasureTheory.Measure.instZero @[simp] theorem zero_toOuterMeasure {_m : MeasurableSpace α} : (0 : Measure α).toOuterMeasure = 0 := rfl #align measure_theory.measure.zero_to_outer_measure MeasureTheory.Measure.zero_toOuterMeasure @[simp, norm_cast] theorem coe_zero {_m : MeasurableSpace α} : ⇑(0 : Measure α) = 0 := rfl #align measure_theory.measure.coe_zero MeasureTheory.Measure.coe_zero @[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]⟩ #align measure_theory.measure.subsingleton MeasureTheory.Measure.instSubsingleton theorem eq_zero_of_isEmpty [IsEmpty α] {_m : MeasurableSpace α} (μ : Measure α) : μ = 0 := Subsingleton.elim μ 0 #align measure_theory.measure.eq_zero_of_is_empty MeasureTheory.Measure.eq_zero_of_isEmpty instance instInhabited [MeasurableSpace α] : Inhabited (Measure α) := ⟨0⟩ #align measure_theory.measure.inhabited MeasureTheory.Measure.instInhabited 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] }⟩ #align measure_theory.measure.has_add MeasureTheory.Measure.instAdd @[simp] theorem add_toOuterMeasure {_m : MeasurableSpace α} (μ₁ μ₂ : Measure α) : (μ₁ + μ₂).toOuterMeasure = μ₁.toOuterMeasure + μ₂.toOuterMeasure := rfl #align measure_theory.measure.add_to_outer_measure MeasureTheory.Measure.add_toOuterMeasure @[simp, norm_cast] theorem coe_add {_m : MeasurableSpace α} (μ₁ μ₂ : Measure α) : ⇑(μ₁ + μ₂) = μ₁ + μ₂ := rfl #align measure_theory.measure.coe_add MeasureTheory.Measure.coe_add theorem add_apply {_m : MeasurableSpace α} (μ₁ μ₂ : Measure α) (s : Set α) : (μ₁ + μ₂) s = μ₁ s + μ₂ s := rfl #align measure_theory.measure.add_apply MeasureTheory.Measure.add_apply 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 #align measure_theory.measure.mul_action MeasureTheory.Measure.instMulAction instance instAddCommMonoid [MeasurableSpace α] : AddCommMonoid (Measure α) := toOuterMeasure_injective.addCommMonoid toOuterMeasure zero_toOuterMeasure add_toOuterMeasure fun _ _ => smul_toOuterMeasure _ _ #align measure_theory.measure.add_comm_monoid MeasureTheory.Measure.instAddCommMonoid def coeAddHom {_ : MeasurableSpace α} : Measure α →+ Set α → ℝ≥0∞ where toFun := (⇑) map_zero' := coe_zero map_add' := coe_add #align measure_theory.measure.coe_add_hom MeasureTheory.Measure.coeAddHom @[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 #align measure_theory.measure.coe_finset_sum MeasureTheory.Measure.coe_finset_sum 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] #align measure_theory.measure.finset_sum_apply MeasureTheory.Measure.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 #align measure_theory.measure.distrib_mul_action MeasureTheory.Measure.instDistribMulAction 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 #align measure_theory.measure.module MeasureTheory.Measure.instModule @[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 #align measure_theory.measure.coe_nnreal_smul_apply MeasureTheory.Measure.coe_nnreal_smul_apply @[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_iff {p : α → Prop} {c : ℝ≥0∞} (hc : c ≠ 0) : (∀ᵐ x ∂c • μ, p x) ↔ ∀ᵐ x ∂μ, p x := by simp only [ae_iff, Algebra.id.smul_eq_mul, smul_apply, or_iff_right_iff_imp, mul_eq_zero] simp only [IsEmpty.forall_iff, hc] #align measure_theory.measure.ae_smul_measure_iff MeasureTheory.Measure.ae_smul_measure_iff 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) #align measure_theory.measure.measure_eq_left_of_subset_of_measure_add_eq MeasureTheory.Measure.measure_eq_left_of_subset_of_measure_add_eq 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'' #align measure_theory.measure.measure_eq_right_of_subset_of_measure_add_eq MeasureTheory.Measure.measure_eq_right_of_subset_of_measure_add_eq 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 #align measure_theory.measure.measure_to_measurable_add_inter_left MeasureTheory.Measure.measure_toMeasurable_add_inter_left 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 #align measure_theory.measure.measure_to_measurable_add_inter_right MeasureTheory.Measure.measure_toMeasurable_add_inter_right instance instPartialOrder [MeasurableSpace α] : PartialOrder (Measure α) where le m₁ m₂ := ∀ s, m₁ s ≤ m₂ s le_refl m s := le_rfl le_trans m₁ m₂ m₃ h₁ h₂ s := le_trans (h₁ s) (h₂ s) le_antisymm m₁ m₂ h₁ h₂ := ext fun s _ => le_antisymm (h₁ s) (h₂ s) #align measure_theory.measure.partial_order MeasureTheory.Measure.instPartialOrder theorem toOuterMeasure_le : μ₁.toOuterMeasure ≤ μ₂.toOuterMeasure ↔ μ₁ ≤ μ₂ := .rfl #align measure_theory.measure.to_outer_measure_le MeasureTheory.Measure.toOuterMeasure_le theorem le_iff : μ₁ ≤ μ₂ ↔ ∀ s, MeasurableSet s → μ₁ s ≤ μ₂ s := outerMeasure_le_iff #align measure_theory.measure.le_iff MeasureTheory.Measure.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 #align measure_theory.measure.le_iff' MeasureTheory.Measure.le_iff' 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] #align measure_theory.measure.lt_iff MeasureTheory.Measure.lt_iff 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] #align measure_theory.measure.lt_iff' MeasureTheory.Measure.lt_iff' instance covariantAddLE [MeasurableSpace α] : CovariantClass (Measure α) (Measure α) (· + ·) (· ≤ ·) := ⟨fun _ν _μ₁ _μ₂ hμ s => add_le_add_left (hμ s) _⟩ #align measure_theory.measure.covariant_add_le MeasureTheory.Measure.covariantAddLE protected theorem le_add_left (h : μ ≤ ν) : μ ≤ ν' + ν := fun s => le_add_left (h s) #align measure_theory.measure.le_add_left MeasureTheory.Measure.le_add_left protected theorem le_add_right (h : μ ≤ ν) : μ ≤ ν + ν' := fun s => le_add_right (h s) #align measure_theory.measure.le_add_right MeasureTheory.Measure.le_add_right @[simp] theorem _root_.MeasureTheory.OuterMeasure.toMeasure_top : (⊤ : OuterMeasure α).toMeasure (by rw [OuterMeasure.top_caratheodory]; exact le_top) = (⊤ : Measure α) := toOuterMeasure_toMeasure (μ := ⊤) #align measure_theory.outer_measure.to_measure_top MeasureTheory.OuterMeasure.toMeasure_top @[simp] theorem toOuterMeasure_top [MeasurableSpace α] : (⊤ : Measure α).toOuterMeasure = (⊤ : OuterMeasure α) := rfl #align measure_theory.measure.to_outer_measure_top MeasureTheory.Measure.toOuterMeasure_top @[simp] theorem top_add : ⊤ + μ = ⊤ := top_unique <\| Measure.le_add_right le_rfl #align measure_theory.measure.top_add MeasureTheory.Measure.top_add @[simp] theorem add_top : μ + ⊤ = ⊤ := top_unique <\| Measure.le_add_left le_rfl #align measure_theory.measure.add_top MeasureTheory.Measure.add_top protected theorem zero_le {_m0 : MeasurableSpace α} (μ : Measure α) : 0 ≤ μ := bot_le #align measure_theory.measure.zero_le MeasureTheory.Measure.zero_le theorem nonpos_iff_eq_zero' : μ ≤ 0 ↔ μ = 0 := μ.zero_le.le_iff_eq #align measure_theory.measure.nonpos_iff_eq_zero' MeasureTheory.Measure.nonpos_iff_eq_zero' @[simp] theorem measure_univ_eq_zero : μ univ = 0 ↔ μ = 0 := ⟨fun h => bot_unique fun s => (h ▸ measure_mono (subset_univ s) : μ s ≤ 0), fun h => h.symm ▸ rfl⟩ #align measure_theory.measure.measure_univ_eq_zero MeasureTheory.Measure.measure_univ_eq_zero theorem measure_univ_ne_zero : μ univ ≠ 0 ↔ μ ≠ 0 := measure_univ_eq_zero.not #align measure_theory.measure.measure_univ_ne_zero MeasureTheory.Measure.measure_univ_ne_zero instance [NeZero μ] : NeZero (μ univ) := ⟨measure_univ_ne_zero.2 <\| NeZero.ne μ⟩ @[simp] theorem measure_univ_pos : 0 < μ univ ↔ μ ≠ 0 := pos_iff_ne_zero.trans measure_univ_ne_zero #align measure_theory.measure.measure_univ_pos MeasureTheory.Measure.measure_univ_pos def liftLinear {m0 : MeasurableSpace α} (f : OuterMeasure α →ₗ[ℝ≥0∞] OuterMeasure β) (hf : ∀ μ : Measure α, ‹_› ≤ (f μ.toOuterMeasure).caratheodory) : Measure α →ₗ[ℝ≥0∞] Measure β where toFun μ := (f μ.toOuterMeasure).toMeasure (hf μ) map_add' μ₁ μ₂ := ext fun s hs => by simp only [map_add, coe_add, Pi.add_apply, toMeasure_apply, add_toOuterMeasure, OuterMeasure.coe_add, hs] map_smul' c μ := ext fun s hs => by simp only [LinearMap.map_smulₛₗ, coe_smul, Pi.smul_apply, toMeasure_apply, smul_toOuterMeasure (R := ℝ≥0∞), OuterMeasure.coe_smul (R := ℝ≥0∞), smul_apply, hs] #align measure_theory.measure.lift_linear MeasureTheory.Measure.liftLinear lemma liftLinear_apply₀ {f : OuterMeasure α →ₗ[ℝ≥0∞] OuterMeasure β} (hf) {s : Set β} (hs : NullMeasurableSet s (liftLinear f hf μ)) : liftLinear f hf μ s = f μ.toOuterMeasure s := toMeasure_apply₀ _ (hf μ) hs @[simp] theorem liftLinear_apply {f : OuterMeasure α →ₗ[ℝ≥0∞] OuterMeasure β} (hf) {s : Set β} (hs : MeasurableSet s) : liftLinear f hf μ s = f μ.toOuterMeasure s := toMeasure_apply _ (hf μ) hs #align measure_theory.measure.lift_linear_apply MeasureTheory.Measure.liftLinear_apply theorem le_liftLinear_apply {f : OuterMeasure α →ₗ[ℝ≥0∞] OuterMeasure β} (hf) (s : Set β) : f μ.toOuterMeasure s ≤ liftLinear f hf μ s := le_toMeasure_apply _ (hf μ) s #align measure_theory.measure.le_lift_linear_apply MeasureTheory.Measure.le_liftLinear_apply def mapₗ [MeasurableSpace α] (f : α → β) : Measure α →ₗ[ℝ≥0∞] Measure β := if hf : Measurable f then liftLinear (OuterMeasure.map f) fun μ _s hs t => le_toOuterMeasure_caratheodory μ _ (hf hs) (f ⁻¹' t) else 0 #align measure_theory.measure.mapₗ MeasureTheory.Measure.mapₗ theorem mapₗ_congr {f g : α → β} (hf : Measurable f) (hg : Measurable g) (h : f =ᵐ[μ] g) : mapₗ f μ = mapₗ g μ := by ext1 s hs simpa only [mapₗ, hf, hg, hs, dif_pos, liftLinear_apply, OuterMeasure.map_apply] using measure_congr (h.preimage s) #align measure_theory.measure.mapₗ_congr MeasureTheory.Measure.mapₗ_congr irreducible_def map [MeasurableSpace α] (f : α → β) (μ : Measure α) : Measure β := if hf : AEMeasurable f μ then mapₗ (hf.mk f) μ else 0 #align measure_theory.measure.map MeasureTheory.Measure.map theorem mapₗ_mk_apply_of_aemeasurable {f : α → β} (hf : AEMeasurable f μ) : mapₗ (hf.mk f) μ = map f μ := by simp [map, hf] #align measure_theory.measure.mapₗ_mk_apply_of_ae_measurable MeasureTheory.Measure.mapₗ_mk_apply_of_aemeasurable theorem mapₗ_apply_of_measurable {f : α → β} (hf : Measurable f) (μ : Measure α) : mapₗ f μ = map f μ := by simp only [← mapₗ_mk_apply_of_aemeasurable hf.aemeasurable] exact mapₗ_congr hf hf.aemeasurable.measurable_mk hf.aemeasurable.ae_eq_mk #align measure_theory.measure.mapₗ_apply_of_measurable MeasureTheory.Measure.mapₗ_apply_of_measurable @[simp] theorem map_add (μ ν : Measure α) {f : α → β} (hf : Measurable f) : (μ + ν).map f = μ.map f + ν.map f := by simp [← mapₗ_apply_of_measurable hf] #align measure_theory.measure.map_add MeasureTheory.Measure.map_add @[simp] theorem map_zero (f : α → β) : (0 : Measure α).map f = 0 := by by_cases hf : AEMeasurable f (0 : Measure α) <;> simp [map, hf] #align measure_theory.measure.map_zero MeasureTheory.Measure.map_zero @[simp] theorem map_of_not_aemeasurable {f : α → β} {μ : Measure α} (hf : ¬AEMeasurable f μ) : μ.map f = 0 := by simp [map, hf] #align measure_theory.measure.map_of_not_ae_measurable MeasureTheory.Measure.map_of_not_aemeasurable theorem map_congr {f g : α → β} (h : f =ᵐ[μ] g) : Measure.map f μ = Measure.map g μ := by by_cases hf : AEMeasurable f μ · have hg : AEMeasurable g μ := hf.congr h simp only [← mapₗ_mk_apply_of_aemeasurable hf, ← mapₗ_mk_apply_of_aemeasurable hg] exact mapₗ_congr hf.measurable_mk hg.measurable_mk (hf.ae_eq_mk.symm.trans (h.trans hg.ae_eq_mk)) · have hg : ¬AEMeasurable g μ := by simpa [← aemeasurable_congr h] using hf simp [map_of_not_aemeasurable, hf, hg] #align measure_theory.measure.map_congr MeasureTheory.Measure.map_congr @[simp] protected theorem map_smul (c : ℝ≥0∞) (μ : Measure α) (f : α → β) : (c • μ).map f = c • μ.map f := by rcases eq_or_ne c 0 with (rfl \| hc); · simp by_cases hf : AEMeasurable f μ · have hfc : AEMeasurable f (c • μ) := ⟨hf.mk f, hf.measurable_mk, (ae_smul_measure_iff hc).2 hf.ae_eq_mk⟩ simp only [← mapₗ_mk_apply_of_aemeasurable hf, ← mapₗ_mk_apply_of_aemeasurable hfc, LinearMap.map_smulₛₗ, RingHom.id_apply] congr 1 apply mapₗ_congr hfc.measurable_mk hf.measurable_mk exact EventuallyEq.trans ((ae_smul_measure_iff hc).1 hfc.ae_eq_mk.symm) hf.ae_eq_mk · have hfc : ¬AEMeasurable f (c • μ) := by intro hfc exact hf ⟨hfc.mk f, hfc.measurable_mk, (ae_smul_measure_iff hc).1 hfc.ae_eq_mk⟩ simp [map_of_not_aemeasurable hf, map_of_not_aemeasurable hfc] #align measure_theory.measure.map_smul MeasureTheory.Measure.map_smul @[simp] protected theorem map_smul_nnreal (c : ℝ≥0) (μ : Measure α) (f : α → β) : (c • μ).map f = c • μ.map f := μ.map_smul (c : ℝ≥0∞) f #align measure_theory.measure.map_smul_nnreal MeasureTheory.Measure.map_smul_nnreal variable {f : α → β} lemma map_apply₀ {f : α → β} (hf : AEMeasurable f μ) {s : Set β} (hs : NullMeasurableSet s (map f μ)) : μ.map f s = μ (f ⁻¹' s) := by rw [map, dif_pos hf, mapₗ, dif_pos hf.measurable_mk] at hs ⊢ rw [liftLinear_apply₀ _ hs, measure_congr (hf.ae_eq_mk.preimage s)] rfl @[simp] theorem map_apply_of_aemeasurable (hf : AEMeasurable f μ) {s : Set β} (hs : MeasurableSet s) : μ.map f s = μ (f ⁻¹' s) := map_apply₀ hf hs.nullMeasurableSet #align measure_theory.measure.map_apply_of_ae_measurable MeasureTheory.Measure.map_apply_of_aemeasurable @[simp] theorem map_apply (hf : Measurable f) {s : Set β} (hs : MeasurableSet s) : μ.map f s = μ (f ⁻¹' s) := map_apply_of_aemeasurable hf.aemeasurable hs #align measure_theory.measure.map_apply MeasureTheory.Measure.map_apply theorem map_toOuterMeasure (hf : AEMeasurable f μ) : (μ.map f).toOuterMeasure = (OuterMeasure.map f μ.toOuterMeasure).trim := by rw [← trimmed, OuterMeasure.trim_eq_trim_iff] intro s hs simp [hf, hs] #align measure_theory.measure.map_to_outer_measure MeasureTheory.Measure.map_toOuterMeasure @[simp] lemma map_eq_zero_iff (hf : AEMeasurable f μ) : μ.map f = 0 ↔ μ = 0 := by simp_rw [← measure_univ_eq_zero, map_apply_of_aemeasurable hf .univ, preimage_univ] @[simp] lemma mapₗ_eq_zero_iff (hf : Measurable f) : Measure.mapₗ f μ = 0 ↔ μ = 0 := by rw [mapₗ_apply_of_measurable hf, map_eq_zero_iff hf.aemeasurable] lemma map_ne_zero_iff (hf : AEMeasurable f μ) : μ.map f ≠ 0 ↔ μ ≠ 0 := (map_eq_zero_iff hf).not lemma mapₗ_ne_zero_iff (hf : Measurable f) : Measure.mapₗ f μ ≠ 0 ↔ μ ≠ 0 := (mapₗ_eq_zero_iff hf).not @[simp] theorem map_id : map id μ = μ := ext fun _ => map_apply measurable_id #align measure_theory.measure.map_id MeasureTheory.Measure.map_id @[simp] theorem map_id' : map (fun x => x) μ = μ := map_id #align measure_theory.measure.map_id' MeasureTheory.Measure.map_id' theorem map_map {g : β → γ} {f : α → β} (hg : Measurable g) (hf : Measurable f) : (μ.map f).map g = μ.map (g ∘ f) := ext fun s hs => by simp [hf, hg, hs, hg hs, hg.comp hf, ← preimage_comp] #align measure_theory.measure.map_map MeasureTheory.Measure.map_map @[mono] theorem map_mono {f : α → β} (h : μ ≤ ν) (hf : Measurable f) : μ.map f ≤ ν.map f := le_iff.2 fun s hs ↦ by simp [hf.aemeasurable, hs, h _] #align measure_theory.measure.map_mono MeasureTheory.Measure.map_mono theorem le_map_apply {f : α → β} (hf : AEMeasurable f μ) (s : Set β) : μ (f ⁻¹' s) ≤ μ.map f s := calc μ (f ⁻¹' s) ≤ μ (f ⁻¹' toMeasurable (μ.map f) s) := by gcongr; apply subset_toMeasurable _ = μ.map f (toMeasurable (μ.map f) s) := (map_apply_of_aemeasurable hf <\| measurableSet_toMeasurable _ _).symm _ = μ.map f s := measure_toMeasurable _ #align measure_theory.measure.le_map_apply MeasureTheory.Measure.le_map_apply theorem le_map_apply_image {f : α → β} (hf : AEMeasurable f μ) (s : Set α) : μ s ≤ μ.map f (f '' s) := (measure_mono (subset_preimage_image f s)).trans (le_map_apply hf _) theorem preimage_null_of_map_null {f : α → β} (hf : AEMeasurable f μ) {s : Set β} (hs : μ.map f s = 0) : μ (f ⁻¹' s) = 0 := nonpos_iff_eq_zero.mp <\| (le_map_apply hf s).trans_eq hs #align measure_theory.measure.preimage_null_of_map_null MeasureTheory.Measure.preimage_null_of_map_null theorem tendsto_ae_map {f : α → β} (hf : AEMeasurable f μ) : Tendsto f (ae μ) (ae (μ.map f)) := fun _ hs => preimage_null_of_map_null hf hs #align measure_theory.measure.tendsto_ae_map MeasureTheory.Measure.tendsto_ae_map def comapₗ [MeasurableSpace α] (f : α → β) : Measure β →ₗ[ℝ≥0∞] Measure α := if hf : Injective f ∧ ∀ s, MeasurableSet s → MeasurableSet (f '' s) then liftLinear (OuterMeasure.comap f) fun μ s hs t => by simp only [OuterMeasure.comap_apply, image_inter hf.1, image_diff hf.1] apply le_toOuterMeasure_caratheodory exact hf.2 s hs else 0 #align measure_theory.measure.comapₗ MeasureTheory.Measure.comapₗ theorem comapₗ_apply {β} [MeasurableSpace α] {mβ : MeasurableSpace β} (f : α → β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → MeasurableSet (f '' s)) (μ : Measure β) (hs : MeasurableSet s) : comapₗ f μ s = μ (f '' s) := by rw [comapₗ, dif_pos, liftLinear_apply _ hs, OuterMeasure.comap_apply, coe_toOuterMeasure] exact ⟨hfi, hf⟩ #align measure_theory.measure.comapₗ_apply MeasureTheory.Measure.comapₗ_apply def comap [MeasurableSpace α] (f : α → β) (μ : Measure β) : Measure α := if hf : Injective f ∧ ∀ s, MeasurableSet s → NullMeasurableSet (f '' s) μ then (OuterMeasure.comap f μ.toOuterMeasure).toMeasure fun s hs t => by simp only [OuterMeasure.comap_apply, image_inter hf.1, image_diff hf.1] exact (measure_inter_add_diff₀ _ (hf.2 s hs)).symm else 0 #align measure_theory.measure.comap MeasureTheory.Measure.comap theorem comap_apply₀ [MeasurableSpace α] (f : α → β) (μ : Measure β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → NullMeasurableSet (f '' s) μ) (hs : NullMeasurableSet s (comap f μ)) : comap f μ s = μ (f '' s) := by rw [comap, dif_pos (And.intro hfi hf)] at hs ⊢ rw [toMeasure_apply₀ _ _ hs, OuterMeasure.comap_apply, coe_toOuterMeasure] #align measure_theory.measure.comap_apply₀ MeasureTheory.Measure.comap_apply₀ theorem le_comap_apply {β} [MeasurableSpace α] {mβ : MeasurableSpace β} (f : α → β) (μ : Measure β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → NullMeasurableSet (f '' s) μ) (s : Set α) : μ (f '' s) ≤ comap f μ s := by rw [comap, dif_pos (And.intro hfi hf)] exact le_toMeasure_apply _ _ _ #align measure_theory.measure.le_comap_apply MeasureTheory.Measure.le_comap_apply theorem comap_apply {β} [MeasurableSpace α] {_mβ : MeasurableSpace β} (f : α → β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → MeasurableSet (f '' s)) (μ : Measure β) (hs : MeasurableSet s) : comap f μ s = μ (f '' s) := comap_apply₀ f μ hfi (fun s hs => (hf s hs).nullMeasurableSet) hs.nullMeasurableSet #align measure_theory.measure.comap_apply MeasureTheory.Measure.comap_apply theorem comapₗ_eq_comap {β} [MeasurableSpace α] {_mβ : MeasurableSpace β} (f : α → β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → MeasurableSet (f '' s)) (μ : Measure β) (hs : MeasurableSet s) : comapₗ f μ s = comap f μ s := (comapₗ_apply f hfi hf μ hs).trans (comap_apply f hfi hf μ hs).symm #align measure_theory.measure.comapₗ_eq_comap MeasureTheory.Measure.comapₗ_eq_comap theorem measure_image_eq_zero_of_comap_eq_zero {β} [MeasurableSpace α] {_mβ : MeasurableSpace β} (f : α → β) (μ : Measure β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → NullMeasurableSet (f '' s) μ) {s : Set α} (hs : comap f μ s = 0) : μ (f '' s) = 0 := le_antisymm ((le_comap_apply f μ hfi hf s).trans hs.le) (zero_le _) #align measure_theory.measure.measure_image_eq_zero_of_comap_eq_zero MeasureTheory.Measure.measure_image_eq_zero_of_comap_eq_zero theorem ae_eq_image_of_ae_eq_comap {β} [MeasurableSpace α] {mβ : MeasurableSpace β} (f : α → β) (μ : Measure β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → NullMeasurableSet (f '' s) μ) {s t : Set α} (hst : s =ᵐ[comap f μ] t) : f '' s =ᵐ[μ] f '' t := by rw [EventuallyEq, ae_iff] at hst ⊢ have h_eq_α : { a : α \| ¬s a = t a } = s \ t ∪ t \ s := by ext1 x simp only [eq_iff_iff, mem_setOf_eq, mem_union, mem_diff] tauto have h_eq_β : { a : β \| ¬(f '' s) a = (f '' t) a } = f '' s \ f '' t ∪ f '' t \ f '' s := by ext1 x simp only [eq_iff_iff, mem_setOf_eq, mem_union, mem_diff] tauto rw [← Set.image_diff hfi, ← Set.image_diff hfi, ← Set.image_union] at h_eq_β rw [h_eq_β] rw [h_eq_α] at hst exact measure_image_eq_zero_of_comap_eq_zero f μ hfi hf hst #align measure_theory.measure.ae_eq_image_of_ae_eq_comap MeasureTheory.Measure.ae_eq_image_of_ae_eq_comap theorem NullMeasurableSet.image {β} [MeasurableSpace α] {mβ : MeasurableSpace β} (f : α → β) (μ : Measure β) (hfi : Injective f) (hf : ∀ s, MeasurableSet s → NullMeasurableSet (f '' s) μ) {s : Set α} (hs : NullMeasurableSet s (μ.comap f)) : NullMeasurableSet (f '' s) μ := by refine ⟨toMeasurable μ (f '' toMeasurable (μ.comap f) s), measurableSet_toMeasurable _ _, ?_⟩ refine EventuallyEq.trans ?_ (NullMeasurableSet.toMeasurable_ae_eq ?_).symm swap · exact hf _ (measurableSet_toMeasurable _ _) have h : toMeasurable (comap f μ) s =ᵐ[comap f μ] s := NullMeasurableSet.toMeasurable_ae_eq hs exact ae_eq_image_of_ae_eq_comap f μ hfi hf h.symm #align measure_theory.measure.null_measurable_set.image MeasureTheory.Measure.NullMeasurableSet.image theorem comap_preimage {β} [MeasurableSpace α] {mβ : MeasurableSpace β} (f : α → β) (μ : Measure β) {s : Set β} (hf : Injective f) (hf' : Measurable f) (h : ∀ t, MeasurableSet t → NullMeasurableSet (f '' t) μ) (hs : MeasurableSet s) : μ.comap f (f ⁻¹' s) = μ (s ∩ range f) := by rw [comap_apply₀ _ _ hf h (hf' hs).nullMeasurableSet, image_preimage_eq_inter_range] #align measure_theory.measure.comap_preimage MeasureTheory.Measure.comap_preimage def AbsolutelyContinuous {_m0 : MeasurableSpace α} (μ ν : Measure α) : Prop := ∀ ⦃s : Set α⦄, ν s = 0 → μ s = 0 #align measure_theory.measure.absolutely_continuous MeasureTheory.Measure.AbsolutelyContinuous @[inherit_doc MeasureTheory.Measure.AbsolutelyContinuous] scoped[MeasureTheory] infixl:50 " ≪ " => MeasureTheory.Measure.AbsolutelyContinuous theorem absolutelyContinuous_of_le (h : μ ≤ ν) : μ ≪ ν := fun s hs => nonpos_iff_eq_zero.1 <\| hs ▸ le_iff'.1 h s #align measure_theory.measure.absolutely_continuous_of_le MeasureTheory.Measure.absolutelyContinuous_of_le alias _root_.LE.le.absolutelyContinuous := absolutelyContinuous_of_le #align has_le.le.absolutely_continuous LE.le.absolutelyContinuous theorem absolutelyContinuous_of_eq (h : μ = ν) : μ ≪ ν := h.le.absolutelyContinuous #align measure_theory.measure.absolutely_continuous_of_eq MeasureTheory.Measure.absolutelyContinuous_of_eq alias _root_.Eq.absolutelyContinuous := absolutelyContinuous_of_eq #align eq.absolutely_continuous Eq.absolutelyContinuous @[simp] lemma absolutelyContinuous_zero_iff : μ ≪ 0 ↔ μ = 0 := ⟨fun h ↦ measure_univ_eq_zero.mp (h rfl), fun h ↦ h.symm ▸ AbsolutelyContinuous.zero _⟩ alias absolutelyContinuous_refl := AbsolutelyContinuous.refl alias absolutelyContinuous_rfl := AbsolutelyContinuous.rfl lemma absolutelyContinuous_sum_left {μs : ι → Measure α} (hμs : ∀ i, μs i ≪ ν) : Measure.sum μs ≪ ν := AbsolutelyContinuous.mk fun s hs hs0 ↦ by simp [sum_apply _ hs, fun i ↦ hμs i hs0] lemma absolutelyContinuous_sum_right {μs : ι → Measure α} (i : ι) (hνμ : ν ≪ μs i) : ν ≪ Measure.sum μs := by refine AbsolutelyContinuous.mk fun s hs hs0 ↦ ?_ simp only [sum_apply _ hs, ENNReal.tsum_eq_zero] at hs0 exact hνμ (hs0 i) theorem absolutelyContinuous_of_le_smul {μ' : Measure α} {c : ℝ≥0∞} (hμ'_le : μ' ≤ c • μ) : μ' ≪ μ := (Measure.absolutelyContinuous_of_le hμ'_le).trans (Measure.AbsolutelyContinuous.rfl.smul c) #align measure_theory.measure.absolutely_continuous_of_le_smul MeasureTheory.Measure.absolutelyContinuous_of_le_smul lemma smul_absolutelyContinuous {c : ℝ≥0∞} : c • μ ≪ μ := absolutelyContinuous_of_le_smul le_rfl lemma absolutelyContinuous_smul {c : ℝ≥0∞} (hc : c ≠ 0) : μ ≪ c • μ := by simp [AbsolutelyContinuous, hc] theorem ae_le_iff_absolutelyContinuous : ae μ ≤ ae ν ↔ μ ≪ ν := ⟨fun h s => by rw [measure_zero_iff_ae_nmem, measure_zero_iff_ae_nmem] exact fun hs => h hs, fun h s hs => h hs⟩ #align measure_theory.measure.ae_le_iff_absolutely_continuous MeasureTheory.Measure.ae_le_iff_absolutelyContinuous alias ⟨_root_.LE.le.absolutelyContinuous_of_ae, AbsolutelyContinuous.ae_le⟩ := ae_le_iff_absolutelyContinuous #align has_le.le.absolutely_continuous_of_ae LE.le.absolutelyContinuous_of_ae #align measure_theory.measure.absolutely_continuous.ae_le MeasureTheory.Measure.AbsolutelyContinuous.ae_le alias ae_mono' := AbsolutelyContinuous.ae_le #align measure_theory.measure.ae_mono' MeasureTheory.Measure.ae_mono' theorem AbsolutelyContinuous.ae_eq (h : μ ≪ ν) {f g : α → δ} (h' : f =ᵐ[ν] g) : f =ᵐ[μ] g := h.ae_le h' #align measure_theory.measure.absolutely_continuous.ae_eq MeasureTheory.Measure.AbsolutelyContinuous.ae_eq protected theorem _root_.MeasureTheory.AEDisjoint.of_absolutelyContinuous (h : AEDisjoint μ s t) {ν : Measure α} (h' : ν ≪ μ) : AEDisjoint ν s t := h' h protected theorem _root_.MeasureTheory.AEDisjoint.of_le (h : AEDisjoint μ s t) {ν : Measure α} (h' : ν ≤ μ) : AEDisjoint ν s t := h.of_absolutelyContinuous (Measure.absolutelyContinuous_of_le h') structure QuasiMeasurePreserving {m0 : MeasurableSpace α} (f : α → β) (μa : Measure α := by volume_tac) (μb : Measure β := by volume_tac) : Prop where protected measurable : Measurable f protected absolutelyContinuous : μa.map f ≪ μb #align measure_theory.measure.quasi_measure_preserving MeasureTheory.Measure.QuasiMeasurePreserving #align measure_theory.measure.quasi_measure_preserving.measurable MeasureTheory.Measure.QuasiMeasurePreserving.measurable #align measure_theory.measure.quasi_measure_preserving.absolutely_continuous MeasureTheory.Measure.QuasiMeasurePreserving.absolutelyContinuous open Measure open MeasureTheory protected theorem _root_.AEMeasurable.nullMeasurable {f : α → β} (h : AEMeasurable f μ) : NullMeasurable f μ := let ⟨_g, hgm, hg⟩ := h; hgm.nullMeasurable.congr hg.symm #align ae_measurable.null_measurable AEMeasurable.nullMeasurable lemma _root_.AEMeasurable.nullMeasurableSet_preimage {f : α → β} {s : Set β} (hf : AEMeasurable f μ) (hs : MeasurableSet s) : NullMeasurableSet (f ⁻¹' s) μ := hf.nullMeasurable hs theorem NullMeasurableSet.preimage {ν : Measure β} {f : α → β} {t : Set β} (ht : NullMeasurableSet t ν) (hf : QuasiMeasurePreserving f μ ν) : NullMeasurableSet (f ⁻¹' t) μ := ⟨f ⁻¹' toMeasurable ν t, hf.measurable (measurableSet_toMeasurable _ _), hf.ae_eq ht.toMeasurable_ae_eq.symm⟩ #align measure_theory.null_measurable_set.preimage MeasureTheory.NullMeasurableSet.preimage theorem NullMeasurableSet.mono_ac (h : NullMeasurableSet s μ) (hle : ν ≪ μ) : NullMeasurableSet s ν := h.preimage <\| (QuasiMeasurePreserving.id μ).mono_left hle #align measure_theory.null_measurable_set.mono_ac MeasureTheory.NullMeasurableSet.mono_ac theorem NullMeasurableSet.mono (h : NullMeasurableSet s μ) (hle : ν ≤ μ) : NullMeasurableSet s ν := h.mono_ac hle.absolutelyContinuous #align measure_theory.null_measurable_set.mono MeasureTheory.NullMeasurableSet.mono theorem AEDisjoint.preimage {ν : Measure β} {f : α → β} {s t : Set β} (ht : AEDisjoint ν s t) (hf : QuasiMeasurePreserving f μ ν) : AEDisjoint μ (f ⁻¹' s) (f ⁻¹' t) := hf.preimage_null ht #align measure_theory.ae_disjoint.preimage MeasureTheory.AEDisjoint.preimage @[simp]	Mathlib/MeasureTheory/Measure/MeasureSpace.lean	1,986	1,987	theorem ae_eq_bot : ae μ = ⊥ ↔ μ = 0 := by	rw [← empty_mem_iff_bot, mem_ae_iff, compl_empty, measure_univ_eq_zero]
import Mathlib.Algebra.BigOperators.Intervals import Mathlib.Algebra.BigOperators.Ring.List import Mathlib.Data.Int.ModEq import Mathlib.Data.Nat.Bits import Mathlib.Data.Nat.Log import Mathlib.Data.List.Indexes import Mathlib.Data.List.Palindrome import Mathlib.Tactic.IntervalCases import Mathlib.Tactic.Linarith import Mathlib.Tactic.Ring #align_import data.nat.digits from "leanprover-community/mathlib"@"369525b73f229ccd76a6ec0e0e0bf2be57599768" namespace Nat variable {n : ℕ} def digitsAux0 : ℕ → List ℕ \| 0 => [] \| n + 1 => [n + 1] #align nat.digits_aux_0 Nat.digitsAux0 def digitsAux1 (n : ℕ) : List ℕ := List.replicate n 1 #align nat.digits_aux_1 Nat.digitsAux1 def digitsAux (b : ℕ) (h : 2 ≤ b) : ℕ → List ℕ \| 0 => [] \| n + 1 => ((n + 1) % b) :: digitsAux b h ((n + 1) / b) decreasing_by exact Nat.div_lt_self (Nat.succ_pos _) h #align nat.digits_aux Nat.digitsAux @[simp] theorem digitsAux_zero (b : ℕ) (h : 2 ≤ b) : digitsAux b h 0 = [] := by rw [digitsAux] #align nat.digits_aux_zero Nat.digitsAux_zero theorem digitsAux_def (b : ℕ) (h : 2 ≤ b) (n : ℕ) (w : 0 < n) : digitsAux b h n = (n % b) :: digitsAux b h (n / b) := by cases n · cases w · rw [digitsAux] #align nat.digits_aux_def Nat.digitsAux_def def digits : ℕ → ℕ → List ℕ \| 0 => digitsAux0 \| 1 => digitsAux1 \| b + 2 => digitsAux (b + 2) (by norm_num) #align nat.digits Nat.digits @[simp] theorem digits_zero (b : ℕ) : digits b 0 = [] := by rcases b with (_ \| ⟨_ \| ⟨_⟩⟩) <;> simp [digits, digitsAux0, digitsAux1] #align nat.digits_zero Nat.digits_zero -- @[simp] -- Porting note (#10618): simp can prove this theorem digits_zero_zero : digits 0 0 = [] := rfl #align nat.digits_zero_zero Nat.digits_zero_zero @[simp] theorem digits_zero_succ (n : ℕ) : digits 0 n.succ = [n + 1] := rfl #align nat.digits_zero_succ Nat.digits_zero_succ theorem digits_zero_succ' : ∀ {n : ℕ}, n ≠ 0 → digits 0 n = [n] \| 0, h => (h rfl).elim \| _ + 1, _ => rfl #align nat.digits_zero_succ' Nat.digits_zero_succ' @[simp] theorem digits_one (n : ℕ) : digits 1 n = List.replicate n 1 := rfl #align nat.digits_one Nat.digits_one -- @[simp] -- Porting note (#10685): dsimp can prove this theorem digits_one_succ (n : ℕ) : digits 1 (n + 1) = 1 :: digits 1 n := rfl #align nat.digits_one_succ Nat.digits_one_succ theorem digits_add_two_add_one (b n : ℕ) : digits (b + 2) (n + 1) = ((n + 1) % (b + 2)) :: digits (b + 2) ((n + 1) / (b + 2)) := by simp [digits, digitsAux_def] #align nat.digits_add_two_add_one Nat.digits_add_two_add_one @[simp] lemma digits_of_two_le_of_pos {b : ℕ} (hb : 2 ≤ b) (hn : 0 < n) : Nat.digits b n = n % b :: Nat.digits b (n / b) := by rw [Nat.eq_add_of_sub_eq hb rfl, Nat.eq_add_of_sub_eq hn rfl, Nat.digits_add_two_add_one] theorem digits_def' : ∀ {b : ℕ} (_ : 1 < b) {n : ℕ} (_ : 0 < n), digits b n = (n % b) :: digits b (n / b) \| 0, h => absurd h (by decide) \| 1, h => absurd h (by decide) \| b + 2, _ => digitsAux_def _ (by simp) _ #align nat.digits_def' Nat.digits_def' @[simp] theorem digits_of_lt (b x : ℕ) (hx : x ≠ 0) (hxb : x < b) : digits b x = [x] := by rcases exists_eq_succ_of_ne_zero hx with ⟨x, rfl⟩ rcases Nat.exists_eq_add_of_le' ((Nat.le_add_left 1 x).trans_lt hxb) with ⟨b, rfl⟩ rw [digits_add_two_add_one, div_eq_of_lt hxb, digits_zero, mod_eq_of_lt hxb] #align nat.digits_of_lt Nat.digits_of_lt theorem digits_add (b : ℕ) (h : 1 < b) (x y : ℕ) (hxb : x < b) (hxy : x ≠ 0 ∨ y ≠ 0) : digits b (x + b * y) = x :: digits b y := by rcases Nat.exists_eq_add_of_le' h with ⟨b, rfl : _ = _ + 2⟩ cases y · simp [hxb, hxy.resolve_right (absurd rfl)] dsimp [digits] rw [digitsAux_def] · congr · simp [Nat.add_mod, mod_eq_of_lt hxb] · simp [add_mul_div_left, div_eq_of_lt hxb] · apply Nat.succ_pos #align nat.digits_add Nat.digits_add -- If we had a function converting a list into a polynomial, -- and appropriate lemmas about that function, -- we could rewrite this in terms of that. def ofDigits {α : Type} [Semiring α] (b : α) : List ℕ → α \| [] => 0 \| h :: t => h + b ofDigits b t #align nat.of_digits Nat.ofDigits theorem ofDigits_eq_foldr {α : Type} [Semiring α] (b : α) (L : List ℕ) : ofDigits b L = List.foldr (fun x y => ↑x + b y) 0 L := by induction' L with d L ih · rfl · dsimp [ofDigits] rw [ih] #align nat.of_digits_eq_foldr Nat.ofDigits_eq_foldr theorem ofDigits_eq_sum_map_with_index_aux (b : ℕ) (l : List ℕ) : ((List.range l.length).zipWith ((fun i a : ℕ => a * b ^ (i + 1))) l).sum = b * ((List.range l.length).zipWith (fun i a => a * b ^ i) l).sum := by suffices (List.range l.length).zipWith (fun i a : ℕ => a * b ^ (i + 1)) l = (List.range l.length).zipWith (fun i a => b * (a * b ^ i)) l by simp [this] congr; ext; simp [pow_succ]; ring #align nat.of_digits_eq_sum_map_with_index_aux Nat.ofDigits_eq_sum_map_with_index_aux theorem ofDigits_eq_sum_mapIdx (b : ℕ) (L : List ℕ) : ofDigits b L = (L.mapIdx fun i a => a * b ^ i).sum := by rw [List.mapIdx_eq_enum_map, List.enum_eq_zip_range, List.map_uncurry_zip_eq_zipWith, ofDigits_eq_foldr] induction' L with hd tl hl · simp · simpa [List.range_succ_eq_map, List.zipWith_map_left, ofDigits_eq_sum_map_with_index_aux] using Or.inl hl #align nat.of_digits_eq_sum_map_with_index Nat.ofDigits_eq_sum_mapIdx @[simp] theorem ofDigits_nil {b : ℕ} : ofDigits b [] = 0 := rfl @[simp] theorem ofDigits_singleton {b n : ℕ} : ofDigits b [n] = n := by simp [ofDigits] #align nat.of_digits_singleton Nat.ofDigits_singleton @[simp] theorem ofDigits_one_cons {α : Type} [Semiring α] (h : ℕ) (L : List ℕ) : ofDigits (1 : α) (h :: L) = h + ofDigits 1 L := by simp [ofDigits] #align nat.of_digits_one_cons Nat.ofDigits_one_cons theorem ofDigits_cons {b hd} {tl : List ℕ} : ofDigits b (hd :: tl) = hd + b ofDigits b tl := rfl theorem ofDigits_append {b : ℕ} {l1 l2 : List ℕ} : ofDigits b (l1 ++ l2) = ofDigits b l1 + b ^ l1.length * ofDigits b l2 := by induction' l1 with hd tl IH · simp [ofDigits] · rw [ofDigits, List.cons_append, ofDigits, IH, List.length_cons, pow_succ'] ring #align nat.of_digits_append Nat.ofDigits_append @[norm_cast] theorem coe_ofDigits (α : Type) [Semiring α] (b : ℕ) (L : List ℕ) : ((ofDigits b L : ℕ) : α) = ofDigits (b : α) L := by induction' L with d L ih · simp [ofDigits] · dsimp [ofDigits]; push_cast; rw [ih] #align nat.coe_of_digits Nat.coe_ofDigits @[norm_cast] theorem coe_int_ofDigits (b : ℕ) (L : List ℕ) : ((ofDigits b L : ℕ) : ℤ) = ofDigits (b : ℤ) L := by induction' L with d L _ · rfl · dsimp [ofDigits]; push_cast; simp only #align nat.coe_int_of_digits Nat.coe_int_ofDigits theorem digits_zero_of_eq_zero {b : ℕ} (h : b ≠ 0) : ∀ {L : List ℕ} (_ : ofDigits b L = 0), ∀ l ∈ L, l = 0 \| _ :: _, h0, _, List.Mem.head .. => Nat.eq_zero_of_add_eq_zero_right h0 \| _ :: _, h0, _, List.Mem.tail _ hL => digits_zero_of_eq_zero h (mul_right_injective₀ h (Nat.eq_zero_of_add_eq_zero_left h0)) _ hL #align nat.digits_zero_of_eq_zero Nat.digits_zero_of_eq_zero theorem digits_ofDigits (b : ℕ) (h : 1 < b) (L : List ℕ) (w₁ : ∀ l ∈ L, l < b) (w₂ : ∀ h : L ≠ [], L.getLast h ≠ 0) : digits b (ofDigits b L) = L := by induction' L with d L ih · dsimp [ofDigits] simp · dsimp [ofDigits] replace w₂ := w₂ (by simp) rw [digits_add b h] · rw [ih] · intro l m apply w₁ exact List.mem_cons_of_mem _ m · intro h rw [List.getLast_cons h] at w₂ convert w₂ · exact w₁ d (List.mem_cons_self _ _) · by_cases h' : L = [] · rcases h' with rfl left simpa using w₂ · right contrapose! w₂ refine digits_zero_of_eq_zero h.ne_bot w₂ _ ?_ rw [List.getLast_cons h'] exact List.getLast_mem h' #align nat.digits_of_digits Nat.digits_ofDigits theorem ofDigits_digits (b n : ℕ) : ofDigits b (digits b n) = n := by cases' b with b · cases' n with n · rfl · change ofDigits 0 [n + 1] = n + 1 dsimp [ofDigits] · cases' b with b · induction' n with n ih · rfl · rw [Nat.zero_add] at ih ⊢ simp only [ih, add_comm 1, ofDigits_one_cons, Nat.cast_id, digits_one_succ] · apply Nat.strongInductionOn n _ clear n intro n h cases n · rw [digits_zero] rfl · simp only [Nat.succ_eq_add_one, digits_add_two_add_one] dsimp [ofDigits] rw [h _ (Nat.div_lt_self' _ b)] rw [Nat.mod_add_div] #align nat.of_digits_digits Nat.ofDigits_digits theorem ofDigits_one (L : List ℕ) : ofDigits 1 L = L.sum := by induction' L with _ _ ih · rfl · simp [ofDigits, List.sum_cons, ih] #align nat.of_digits_one Nat.ofDigits_one theorem digits_eq_nil_iff_eq_zero {b n : ℕ} : digits b n = [] ↔ n = 0 := by constructor · intro h have : ofDigits b (digits b n) = ofDigits b [] := by rw [h] convert this rw [ofDigits_digits] · rintro rfl simp #align nat.digits_eq_nil_iff_eq_zero Nat.digits_eq_nil_iff_eq_zero theorem digits_ne_nil_iff_ne_zero {b n : ℕ} : digits b n ≠ [] ↔ n ≠ 0 := not_congr digits_eq_nil_iff_eq_zero #align nat.digits_ne_nil_iff_ne_zero Nat.digits_ne_nil_iff_ne_zero theorem digits_eq_cons_digits_div {b n : ℕ} (h : 1 < b) (w : n ≠ 0) : digits b n = (n % b) :: digits b (n / b) := by rcases b with (_ \| _ \| b) · rw [digits_zero_succ' w, Nat.mod_zero, Nat.div_zero, Nat.digits_zero_zero] · norm_num at h rcases n with (_ \| n) · norm_num at w · simp only [digits_add_two_add_one, ne_eq] #align nat.digits_eq_cons_digits_div Nat.digits_eq_cons_digits_div theorem digits_getLast {b : ℕ} (m : ℕ) (h : 1 < b) (p q) : (digits b m).getLast p = (digits b (m / b)).getLast q := by by_cases hm : m = 0 · simp [hm] simp only [digits_eq_cons_digits_div h hm] rw [List.getLast_cons] #align nat.digits_last Nat.digits_getLast theorem digits.injective (b : ℕ) : Function.Injective b.digits := Function.LeftInverse.injective (ofDigits_digits b) #align nat.digits.injective Nat.digits.injective @[simp] theorem digits_inj_iff {b n m : ℕ} : b.digits n = b.digits m ↔ n = m := (digits.injective b).eq_iff #align nat.digits_inj_iff Nat.digits_inj_iff theorem digits_len (b n : ℕ) (hb : 1 < b) (hn : n ≠ 0) : (b.digits n).length = b.log n + 1 := by induction' n using Nat.strong_induction_on with n IH rw [digits_eq_cons_digits_div hb hn, List.length] by_cases h : n / b = 0 · have hb0 : b ≠ 0 := (Nat.succ_le_iff.1 hb).ne_bot simp [h, log_eq_zero_iff, ← Nat.div_eq_zero_iff hb0.bot_lt] · have : n / b < n := div_lt_self (Nat.pos_of_ne_zero hn) hb rw [IH _ this h, log_div_base, tsub_add_cancel_of_le] refine Nat.succ_le_of_lt (log_pos hb ?_) contrapose! h exact div_eq_of_lt h #align nat.digits_len Nat.digits_len theorem getLast_digit_ne_zero (b : ℕ) {m : ℕ} (hm : m ≠ 0) : (digits b m).getLast (digits_ne_nil_iff_ne_zero.mpr hm) ≠ 0 := by rcases b with (_ \| _ \| b) · cases m · cases hm rfl · simp · cases m · cases hm rfl rename ℕ => m simp only [zero_add, digits_one, List.getLast_replicate_succ m 1] exact Nat.one_ne_zero revert hm apply Nat.strongInductionOn m intro n IH hn by_cases hnb : n < b + 2 · simpa only [digits_of_lt (b + 2) n hn hnb] · rw [digits_getLast n (le_add_left 2 b)] refine IH _ (Nat.div_lt_self hn.bot_lt (one_lt_succ_succ b)) ?_ rw [← pos_iff_ne_zero] exact Nat.div_pos (le_of_not_lt hnb) (zero_lt_succ (succ b)) #align nat.last_digit_ne_zero Nat.getLast_digit_ne_zero theorem mul_ofDigits (n : ℕ) {b : ℕ} {l : List ℕ} : n ofDigits b l = ofDigits b (l.map (n * ·)) := by induction l with \| nil => rfl \| cons hd tl ih => rw [List.map_cons, ofDigits_cons, ofDigits_cons, ← ih] ring theorem ofDigits_add_ofDigits_eq_ofDigits_zipWith_of_length_eq {b : ℕ} {l1 l2 : List ℕ} (h : l1.length = l2.length) : ofDigits b l1 + ofDigits b l2 = ofDigits b (l1.zipWith (· + ·) l2) := by induction l1 generalizing l2 with \| nil => simp_all [eq_comm, List.length_eq_zero, ofDigits] \| cons hd₁ tl₁ ih₁ => induction l2 generalizing tl₁ with \| nil => simp_all \| cons hd₂ tl₂ ih₂ => simp_all only [List.length_cons, succ_eq_add_one, ofDigits_cons, add_left_inj, eq_comm, List.zipWith_cons_cons, add_eq] rw [← ih₁ h.symm, mul_add] ac_rfl theorem digits_lt_base' {b m : ℕ} : ∀ {d}, d ∈ digits (b + 2) m → d < b + 2 := by apply Nat.strongInductionOn m intro n IH d hd cases' n with n · rw [digits_zero] at hd cases hd -- base b+2 expansion of 0 has no digits rw [digits_add_two_add_one] at hd cases hd · exact n.succ.mod_lt (by simp) -- Porting note: Previous code (single line) contained linarith. -- . exact IH _ (Nat.div_lt_self (Nat.succ_pos _) (by linarith)) hd · apply IH ((n + 1) / (b + 2)) · apply Nat.div_lt_self <;> omega · assumption #align nat.digits_lt_base' Nat.digits_lt_base' theorem digits_lt_base {b m d : ℕ} (hb : 1 < b) (hd : d ∈ digits b m) : d < b := by rcases b with (_ \| _ \| b) <;> try simp_all exact digits_lt_base' hd #align nat.digits_lt_base Nat.digits_lt_base theorem ofDigits_lt_base_pow_length' {b : ℕ} {l : List ℕ} (hl : ∀ x ∈ l, x < b + 2) : ofDigits (b + 2) l < (b + 2) ^ l.length := by induction' l with hd tl IH · simp [ofDigits] · rw [ofDigits, List.length_cons, pow_succ] have : (ofDigits (b + 2) tl + 1) * (b + 2) ≤ (b + 2) ^ tl.length * (b + 2) := mul_le_mul (IH fun x hx => hl _ (List.mem_cons_of_mem _ hx)) (by rfl) (by simp only [zero_le]) (Nat.zero_le _) suffices ↑hd < b + 2 by linarith exact hl hd (List.mem_cons_self _ _) #align nat.of_digits_lt_base_pow_length' Nat.ofDigits_lt_base_pow_length' theorem ofDigits_lt_base_pow_length {b : ℕ} {l : List ℕ} (hb : 1 < b) (hl : ∀ x ∈ l, x < b) : ofDigits b l < b ^ l.length := by rcases b with (_ \| _ \| b) <;> try simp_all exact ofDigits_lt_base_pow_length' hl #align nat.of_digits_lt_base_pow_length Nat.ofDigits_lt_base_pow_length theorem lt_base_pow_length_digits' {b m : ℕ} : m < (b + 2) ^ (digits (b + 2) m).length := by convert @ofDigits_lt_base_pow_length' b (digits (b + 2) m) fun _ => digits_lt_base' rw [ofDigits_digits (b + 2) m] #align nat.lt_base_pow_length_digits' Nat.lt_base_pow_length_digits' theorem lt_base_pow_length_digits {b m : ℕ} (hb : 1 < b) : m < b ^ (digits b m).length := by rcases b with (_ \| _ \| b) <;> try simp_all exact lt_base_pow_length_digits' #align nat.lt_base_pow_length_digits Nat.lt_base_pow_length_digits theorem ofDigits_digits_append_digits {b m n : ℕ} : ofDigits b (digits b n ++ digits b m) = n + b ^ (digits b n).length * m := by rw [ofDigits_append, ofDigits_digits, ofDigits_digits] #align nat.of_digits_digits_append_digits Nat.ofDigits_digits_append_digits theorem digits_append_digits {b m n : ℕ} (hb : 0 < b) : digits b n ++ digits b m = digits b (n + b ^ (digits b n).length * m) := by rcases eq_or_lt_of_le (Nat.succ_le_of_lt hb) with (rfl \| hb) · simp [List.replicate_add] rw [← ofDigits_digits_append_digits] refine (digits_ofDigits b hb _ (fun l hl => ?_) (fun h_append => ?_)).symm · rcases (List.mem_append.mp hl) with (h \| h) <;> exact digits_lt_base hb h · by_cases h : digits b m = [] · simp only [h, List.append_nil] at h_append ⊢ exact getLast_digit_ne_zero b <\| digits_ne_nil_iff_ne_zero.mp h_append · exact (List.getLast_append' _ _ h) ▸ (getLast_digit_ne_zero _ <\| digits_ne_nil_iff_ne_zero.mp h) theorem digits_len_le_digits_len_succ (b n : ℕ) : (digits b n).length ≤ (digits b (n + 1)).length := by rcases Decidable.eq_or_ne n 0 with (rfl \| hn) · simp rcases le_or_lt b 1 with hb \| hb · interval_cases b <;> simp_arith [digits_zero_succ', hn] simpa [digits_len, hb, hn] using log_mono_right (le_succ _) #align nat.digits_len_le_digits_len_succ Nat.digits_len_le_digits_len_succ theorem le_digits_len_le (b n m : ℕ) (h : n ≤ m) : (digits b n).length ≤ (digits b m).length := monotone_nat_of_le_succ (digits_len_le_digits_len_succ b) h #align nat.le_digits_len_le Nat.le_digits_len_le @[mono] theorem ofDigits_monotone {p q : ℕ} (L : List ℕ) (h : p ≤ q) : ofDigits p L ≤ ofDigits q L := by induction' L with _ _ hi · rfl · simp only [ofDigits, cast_id, add_le_add_iff_left] exact Nat.mul_le_mul h hi theorem sum_le_ofDigits {p : ℕ} (L : List ℕ) (h : 1 ≤ p) : L.sum ≤ ofDigits p L := (ofDigits_one L).symm ▸ ofDigits_monotone L h theorem digit_sum_le (p n : ℕ) : List.sum (digits p n) ≤ n := by induction' n with n · exact digits_zero _ ▸ Nat.le_refl (List.sum []) · induction' p with p · rw [digits_zero_succ, List.sum_cons, List.sum_nil, add_zero] · nth_rw 2 [← ofDigits_digits p.succ (n + 1)] rw [← ofDigits_one <\| digits p.succ n.succ] exact ofDigits_monotone (digits p.succ n.succ) <\| Nat.succ_pos p theorem pow_length_le_mul_ofDigits {b : ℕ} {l : List ℕ} (hl : l ≠ []) (hl2 : l.getLast hl ≠ 0) : (b + 2) ^ l.length ≤ (b + 2) * ofDigits (b + 2) l := by rw [← List.dropLast_append_getLast hl] simp only [List.length_append, List.length, zero_add, List.length_dropLast, ofDigits_append, List.length_dropLast, ofDigits_singleton, add_comm (l.length - 1), pow_add, pow_one] apply Nat.mul_le_mul_left refine le_trans ?_ (Nat.le_add_left _ _) have : 0 < l.getLast hl := by rwa [pos_iff_ne_zero] convert Nat.mul_le_mul_left ((b + 2) ^ (l.length - 1)) this using 1 rw [Nat.mul_one] #align nat.pow_length_le_mul_of_digits Nat.pow_length_le_mul_ofDigits theorem base_pow_length_digits_le' (b m : ℕ) (hm : m ≠ 0) : (b + 2) ^ (digits (b + 2) m).length ≤ (b + 2) * m := by have : digits (b + 2) m ≠ [] := digits_ne_nil_iff_ne_zero.mpr hm convert @pow_length_le_mul_ofDigits b (digits (b+2) m) this (getLast_digit_ne_zero _ hm) rw [ofDigits_digits] #align nat.base_pow_length_digits_le' Nat.base_pow_length_digits_le' theorem base_pow_length_digits_le (b m : ℕ) (hb : 1 < b) : m ≠ 0 → b ^ (digits b m).length ≤ b * m := by rcases b with (_ \| _ \| b) <;> try simp_all exact base_pow_length_digits_le' b m #align nat.base_pow_length_digits_le Nat.base_pow_length_digits_le lemma ofDigits_div_eq_ofDigits_tail {p : ℕ} (hpos : 0 < p) (digits : List ℕ) (w₁ : ∀ l ∈ digits, l < p) : ofDigits p digits / p = ofDigits p digits.tail := by induction' digits with hd tl · simp [ofDigits] · refine Eq.trans (add_mul_div_left hd _ hpos) ?_ rw [Nat.div_eq_of_lt <\| w₁ _ <\| List.mem_cons_self _ _, zero_add] rfl lemma ofDigits_div_pow_eq_ofDigits_drop {p : ℕ} (i : ℕ) (hpos : 0 < p) (digits : List ℕ) (w₁ : ∀ l ∈ digits, l < p) : ofDigits p digits / p ^ i = ofDigits p (digits.drop i) := by induction' i with i hi · simp · rw [Nat.pow_succ, ← Nat.div_div_eq_div_mul, hi, ofDigits_div_eq_ofDigits_tail hpos (List.drop i digits) fun x hx ↦ w₁ x <\| List.mem_of_mem_drop hx, ← List.drop_one, List.drop_drop, add_comm] lemma self_div_pow_eq_ofDigits_drop {p : ℕ} (i n : ℕ) (h : 2 ≤ p): n / p ^ i = ofDigits p ((p.digits n).drop i) := by convert ofDigits_div_pow_eq_ofDigits_drop i (zero_lt_of_lt h) (p.digits n) (fun l hl ↦ digits_lt_base h hl) exact (ofDigits_digits p n).symm open Finset theorem sub_one_mul_sum_div_pow_eq_sub_sum_digits {p : ℕ} (L : List ℕ) {h_nonempty} (h_ne_zero : L.getLast h_nonempty ≠ 0) (h_lt : ∀ l ∈ L, l < p) : (p - 1) * ∑ i ∈ range L.length, (ofDigits p L) / p ^ i.succ = (ofDigits p L) - L.sum := by obtain h \| rfl \| h : 1 < p ∨ 1 = p ∨ p < 1 := trichotomous 1 p · induction' L with hd tl ih · simp [ofDigits] · simp only [List.length_cons, List.sum_cons, self_div_pow_eq_ofDigits_drop _ _ h, digits_ofDigits p h (hd :: tl) h_lt (fun _ => h_ne_zero)] simp only [ofDigits] rw [sum_range_succ, Nat.cast_id] simp only [List.drop, List.drop_length] obtain rfl \| h' := em <\| tl = [] · simp [ofDigits] · have w₁' := fun l hl ↦ h_lt l <\| List.mem_cons_of_mem hd hl have w₂' := fun (h : tl ≠ []) ↦ (List.getLast_cons h) ▸ h_ne_zero have ih := ih (w₂' h') w₁' simp only [self_div_pow_eq_ofDigits_drop _ _ h, digits_ofDigits p h tl w₁' w₂', ← Nat.one_add] at ih have := sum_singleton (fun x ↦ ofDigits p <\| tl.drop x) tl.length rw [← Ico_succ_singleton, List.drop_length, ofDigits] at this have h₁ : 1 ≤ tl.length := List.length_pos.mpr h' rw [← sum_range_add_sum_Ico _ <\| h₁, ← add_zero (∑ x ∈ Ico _ _, ofDigits p (tl.drop x)), ← this, sum_Ico_consecutive _ h₁ <\| (le_add_right tl.length 1), ← sum_Ico_add _ 0 tl.length 1, Ico_zero_eq_range, mul_add, mul_add, ih, range_one, sum_singleton, List.drop, ofDigits, mul_zero, add_zero, ← Nat.add_sub_assoc <\| sum_le_ofDigits _ <\| Nat.le_of_lt h] nth_rw 2 [← one_mul <\| ofDigits p tl] rw [← add_mul, one_eq_succ_zero, Nat.sub_add_cancel <\| zero_lt_of_lt h, Nat.add_sub_add_left] · simp [ofDigits_one] · simp [lt_one_iff.mp h] cases L · rfl · simp [ofDigits] theorem sub_one_mul_sum_log_div_pow_eq_sub_sum_digits {p : ℕ} (n : ℕ) : (p - 1) * ∑ i ∈ range (log p n).succ, n / p ^ i.succ = n - (p.digits n).sum := by obtain h \| rfl \| h : 1 < p ∨ 1 = p ∨ p < 1 := trichotomous 1 p · rcases eq_or_ne n 0 with rfl \| hn · simp · convert sub_one_mul_sum_div_pow_eq_sub_sum_digits (p.digits n) (getLast_digit_ne_zero p hn) <\| (fun l a ↦ digits_lt_base h a) · refine (digits_len p n h hn).symm all_goals exact (ofDigits_digits p n).symm · simp · simp [lt_one_iff.mp h] cases n all_goals simp theorem digits_two_eq_bits (n : ℕ) : digits 2 n = n.bits.map fun b => cond b 1 0 := by induction' n using Nat.binaryRecFromOne with b n h ih · simp · rfl rw [bits_append_bit _ _ fun hn => absurd hn h] cases b · rw [digits_def' one_lt_two] · simpa [Nat.bit, Nat.bit0_val n] · simpa [pos_iff_ne_zero, Nat.bit0_eq_zero] · simpa [Nat.bit, Nat.bit1_val n, add_comm, digits_add 2 one_lt_two 1 n, Nat.add_mul_div_left] #align nat.digits_two_eq_bits Nat.digits_two_eq_bits -- This is really a theorem about polynomials. theorem dvd_ofDigits_sub_ofDigits {α : Type} [CommRing α] {a b k : α} (h : k ∣ a - b) (L : List ℕ) : k ∣ ofDigits a L - ofDigits b L := by induction' L with d L ih · change k ∣ 0 - 0 simp · simp only [ofDigits, add_sub_add_left_eq_sub] exact dvd_mul_sub_mul h ih #align nat.dvd_of_digits_sub_of_digits Nat.dvd_ofDigits_sub_ofDigits theorem ofDigits_modEq' (b b' : ℕ) (k : ℕ) (h : b ≡ b' [MOD k]) (L : List ℕ) : ofDigits b L ≡ ofDigits b' L [MOD k] := by induction' L with d L ih · rfl · dsimp [ofDigits] dsimp [Nat.ModEq] at conv_lhs => rw [Nat.add_mod, Nat.mul_mod, h, ih] conv_rhs => rw [Nat.add_mod, Nat.mul_mod] #align nat.of_digits_modeq' Nat.ofDigits_modEq' theorem ofDigits_modEq (b k : ℕ) (L : List ℕ) : ofDigits b L ≡ ofDigits (b % k) L [MOD k] := ofDigits_modEq' b (b % k) k (b.mod_modEq k).symm L #align nat.of_digits_modeq Nat.ofDigits_modEq theorem ofDigits_mod (b k : ℕ) (L : List ℕ) : ofDigits b L % k = ofDigits (b % k) L % k := ofDigits_modEq b k L #align nat.of_digits_mod Nat.ofDigits_mod	Mathlib/Data/Nat/Digits.lean	666	667	theorem ofDigits_mod_eq_head! (b : ℕ) (l : List ℕ) : ofDigits b l % b = l.head! % b := by	induction l <;> simp [Nat.ofDigits, Int.ModEq]
import Mathlib.Logic.Pairwise import Mathlib.Order.CompleteBooleanAlgebra import Mathlib.Order.Directed import Mathlib.Order.GaloisConnection #align_import data.set.lattice from "leanprover-community/mathlib"@"b86832321b586c6ac23ef8cdef6a7a27e42b13bd" open Function Set universe u variable {α β γ : Type} {ι ι' ι₂ : Sort} {κ κ₁ κ₂ : ι → Sort} {κ' : ι' → Sort} namespace Set theorem mem_iUnion₂ {x : γ} {s : ∀ i, κ i → Set γ} : (x ∈ ⋃ (i) (j), s i j) ↔ ∃ i j, x ∈ s i j := by simp_rw [mem_iUnion] #align set.mem_Union₂ Set.mem_iUnion₂ theorem mem_iInter₂ {x : γ} {s : ∀ i, κ i → Set γ} : (x ∈ ⋂ (i) (j), s i j) ↔ ∀ i j, x ∈ s i j := by simp_rw [mem_iInter] #align set.mem_Inter₂ Set.mem_iInter₂ theorem mem_iUnion_of_mem {s : ι → Set α} {a : α} (i : ι) (ha : a ∈ s i) : a ∈ ⋃ i, s i := mem_iUnion.2 ⟨i, ha⟩ #align set.mem_Union_of_mem Set.mem_iUnion_of_mem theorem mem_iUnion₂_of_mem {s : ∀ i, κ i → Set α} {a : α} {i : ι} (j : κ i) (ha : a ∈ s i j) : a ∈ ⋃ (i) (j), s i j := mem_iUnion₂.2 ⟨i, j, ha⟩ #align set.mem_Union₂_of_mem Set.mem_iUnion₂_of_mem theorem mem_iInter_of_mem {s : ι → Set α} {a : α} (h : ∀ i, a ∈ s i) : a ∈ ⋂ i, s i := mem_iInter.2 h #align set.mem_Inter_of_mem Set.mem_iInter_of_mem theorem mem_iInter₂_of_mem {s : ∀ i, κ i → Set α} {a : α} (h : ∀ i j, a ∈ s i j) : a ∈ ⋂ (i) (j), s i j := mem_iInter₂.2 h #align set.mem_Inter₂_of_mem Set.mem_iInter₂_of_mem instance completeAtomicBooleanAlgebra : CompleteAtomicBooleanAlgebra (Set α) := { instBooleanAlgebraSet with le_sSup := fun s t t_in a a_in => ⟨t, t_in, a_in⟩ sSup_le := fun s t h a ⟨t', ⟨t'_in, a_in⟩⟩ => h t' t'_in a_in le_sInf := fun s t h a a_in t' t'_in => h t' t'_in a_in sInf_le := fun s t t_in a h => h _ t_in iInf_iSup_eq := by intros; ext; simp [Classical.skolem] } instance : OrderTop (Set α) where top := univ le_top := by simp @[congr] theorem iUnion_congr_Prop {p q : Prop} {f₁ : p → Set α} {f₂ : q → Set α} (pq : p ↔ q) (f : ∀ x, f₁ (pq.mpr x) = f₂ x) : iUnion f₁ = iUnion f₂ := iSup_congr_Prop pq f #align set.Union_congr_Prop Set.iUnion_congr_Prop @[congr] theorem iInter_congr_Prop {p q : Prop} {f₁ : p → Set α} {f₂ : q → Set α} (pq : p ↔ q) (f : ∀ x, f₁ (pq.mpr x) = f₂ x) : iInter f₁ = iInter f₂ := iInf_congr_Prop pq f #align set.Inter_congr_Prop Set.iInter_congr_Prop theorem iUnion_plift_up (f : PLift ι → Set α) : ⋃ i, f (PLift.up i) = ⋃ i, f i := iSup_plift_up _ #align set.Union_plift_up Set.iUnion_plift_up theorem iUnion_plift_down (f : ι → Set α) : ⋃ i, f (PLift.down i) = ⋃ i, f i := iSup_plift_down _ #align set.Union_plift_down Set.iUnion_plift_down theorem iInter_plift_up (f : PLift ι → Set α) : ⋂ i, f (PLift.up i) = ⋂ i, f i := iInf_plift_up _ #align set.Inter_plift_up Set.iInter_plift_up theorem iInter_plift_down (f : ι → Set α) : ⋂ i, f (PLift.down i) = ⋂ i, f i := iInf_plift_down _ #align set.Inter_plift_down Set.iInter_plift_down theorem iUnion_eq_if {p : Prop} [Decidable p] (s : Set α) : ⋃ _ : p, s = if p then s else ∅ := iSup_eq_if _ #align set.Union_eq_if Set.iUnion_eq_if theorem iUnion_eq_dif {p : Prop} [Decidable p] (s : p → Set α) : ⋃ h : p, s h = if h : p then s h else ∅ := iSup_eq_dif _ #align set.Union_eq_dif Set.iUnion_eq_dif theorem iInter_eq_if {p : Prop} [Decidable p] (s : Set α) : ⋂ _ : p, s = if p then s else univ := iInf_eq_if _ #align set.Inter_eq_if Set.iInter_eq_if theorem iInf_eq_dif {p : Prop} [Decidable p] (s : p → Set α) : ⋂ h : p, s h = if h : p then s h else univ := _root_.iInf_eq_dif _ #align set.Infi_eq_dif Set.iInf_eq_dif theorem exists_set_mem_of_union_eq_top {ι : Type} (t : Set ι) (s : ι → Set β) (w : ⋃ i ∈ t, s i = ⊤) (x : β) : ∃ i ∈ t, x ∈ s i := by have p : x ∈ ⊤ := Set.mem_univ x rw [← w, Set.mem_iUnion] at p simpa using p #align set.exists_set_mem_of_union_eq_top Set.exists_set_mem_of_union_eq_top theorem nonempty_of_union_eq_top_of_nonempty {ι : Type} (t : Set ι) (s : ι → Set α) (H : Nonempty α) (w : ⋃ i ∈ t, s i = ⊤) : t.Nonempty := by obtain ⟨x, m, -⟩ := exists_set_mem_of_union_eq_top t s w H.some exact ⟨x, m⟩ #align set.nonempty_of_union_eq_top_of_nonempty Set.nonempty_of_union_eq_top_of_nonempty theorem nonempty_of_nonempty_iUnion {s : ι → Set α} (h_Union : (⋃ i, s i).Nonempty) : Nonempty ι := by obtain ⟨x, hx⟩ := h_Union exact ⟨Classical.choose <\| mem_iUnion.mp hx⟩ theorem nonempty_of_nonempty_iUnion_eq_univ {s : ι → Set α} [Nonempty α] (h_Union : ⋃ i, s i = univ) : Nonempty ι := nonempty_of_nonempty_iUnion (s := s) (by simpa only [h_Union] using univ_nonempty) theorem setOf_exists (p : ι → β → Prop) : { x \| ∃ i, p i x } = ⋃ i, { x \| p i x } := ext fun _ => mem_iUnion.symm #align set.set_of_exists Set.setOf_exists theorem setOf_forall (p : ι → β → Prop) : { x \| ∀ i, p i x } = ⋂ i, { x \| p i x } := ext fun _ => mem_iInter.symm #align set.set_of_forall Set.setOf_forall theorem iUnion_subset {s : ι → Set α} {t : Set α} (h : ∀ i, s i ⊆ t) : ⋃ i, s i ⊆ t := iSup_le h #align set.Union_subset Set.iUnion_subset theorem iUnion₂_subset {s : ∀ i, κ i → Set α} {t : Set α} (h : ∀ i j, s i j ⊆ t) : ⋃ (i) (j), s i j ⊆ t := iUnion_subset fun x => iUnion_subset (h x) #align set.Union₂_subset Set.iUnion₂_subset theorem subset_iInter {t : Set β} {s : ι → Set β} (h : ∀ i, t ⊆ s i) : t ⊆ ⋂ i, s i := le_iInf h #align set.subset_Inter Set.subset_iInter theorem subset_iInter₂ {s : Set α} {t : ∀ i, κ i → Set α} (h : ∀ i j, s ⊆ t i j) : s ⊆ ⋂ (i) (j), t i j := subset_iInter fun x => subset_iInter <\| h x #align set.subset_Inter₂ Set.subset_iInter₂ @[simp] theorem iUnion_subset_iff {s : ι → Set α} {t : Set α} : ⋃ i, s i ⊆ t ↔ ∀ i, s i ⊆ t := ⟨fun h _ => Subset.trans (le_iSup s _) h, iUnion_subset⟩ #align set.Union_subset_iff Set.iUnion_subset_iff theorem iUnion₂_subset_iff {s : ∀ i, κ i → Set α} {t : Set α} : ⋃ (i) (j), s i j ⊆ t ↔ ∀ i j, s i j ⊆ t := by simp_rw [iUnion_subset_iff] #align set.Union₂_subset_iff Set.iUnion₂_subset_iff @[simp] theorem subset_iInter_iff {s : Set α} {t : ι → Set α} : (s ⊆ ⋂ i, t i) ↔ ∀ i, s ⊆ t i := le_iInf_iff #align set.subset_Inter_iff Set.subset_iInter_iff -- Porting note (#10618): removing `simp`. `simp` can prove it theorem subset_iInter₂_iff {s : Set α} {t : ∀ i, κ i → Set α} : (s ⊆ ⋂ (i) (j), t i j) ↔ ∀ i j, s ⊆ t i j := by simp_rw [subset_iInter_iff] #align set.subset_Inter₂_iff Set.subset_iInter₂_iff theorem subset_iUnion : ∀ (s : ι → Set β) (i : ι), s i ⊆ ⋃ i, s i := le_iSup #align set.subset_Union Set.subset_iUnion theorem iInter_subset : ∀ (s : ι → Set β) (i : ι), ⋂ i, s i ⊆ s i := iInf_le #align set.Inter_subset Set.iInter_subset theorem subset_iUnion₂ {s : ∀ i, κ i → Set α} (i : ι) (j : κ i) : s i j ⊆ ⋃ (i') (j'), s i' j' := le_iSup₂ i j #align set.subset_Union₂ Set.subset_iUnion₂ theorem iInter₂_subset {s : ∀ i, κ i → Set α} (i : ι) (j : κ i) : ⋂ (i) (j), s i j ⊆ s i j := iInf₂_le i j #align set.Inter₂_subset Set.iInter₂_subset theorem subset_iUnion_of_subset {s : Set α} {t : ι → Set α} (i : ι) (h : s ⊆ t i) : s ⊆ ⋃ i, t i := le_iSup_of_le i h #align set.subset_Union_of_subset Set.subset_iUnion_of_subset theorem iInter_subset_of_subset {s : ι → Set α} {t : Set α} (i : ι) (h : s i ⊆ t) : ⋂ i, s i ⊆ t := iInf_le_of_le i h #align set.Inter_subset_of_subset Set.iInter_subset_of_subset theorem subset_iUnion₂_of_subset {s : Set α} {t : ∀ i, κ i → Set α} (i : ι) (j : κ i) (h : s ⊆ t i j) : s ⊆ ⋃ (i) (j), t i j := le_iSup₂_of_le i j h #align set.subset_Union₂_of_subset Set.subset_iUnion₂_of_subset theorem iInter₂_subset_of_subset {s : ∀ i, κ i → Set α} {t : Set α} (i : ι) (j : κ i) (h : s i j ⊆ t) : ⋂ (i) (j), s i j ⊆ t := iInf₂_le_of_le i j h #align set.Inter₂_subset_of_subset Set.iInter₂_subset_of_subset theorem iUnion_mono {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : ⋃ i, s i ⊆ ⋃ i, t i := iSup_mono h #align set.Union_mono Set.iUnion_mono @[gcongr] theorem iUnion_mono'' {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : iUnion s ⊆ iUnion t := iSup_mono h theorem iUnion₂_mono {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j ⊆ t i j) : ⋃ (i) (j), s i j ⊆ ⋃ (i) (j), t i j := iSup₂_mono h #align set.Union₂_mono Set.iUnion₂_mono theorem iInter_mono {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : ⋂ i, s i ⊆ ⋂ i, t i := iInf_mono h #align set.Inter_mono Set.iInter_mono @[gcongr] theorem iInter_mono'' {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : iInter s ⊆ iInter t := iInf_mono h theorem iInter₂_mono {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j ⊆ t i j) : ⋂ (i) (j), s i j ⊆ ⋂ (i) (j), t i j := iInf₂_mono h #align set.Inter₂_mono Set.iInter₂_mono theorem iUnion_mono' {s : ι → Set α} {t : ι₂ → Set α} (h : ∀ i, ∃ j, s i ⊆ t j) : ⋃ i, s i ⊆ ⋃ i, t i := iSup_mono' h #align set.Union_mono' Set.iUnion_mono' theorem iUnion₂_mono' {s : ∀ i, κ i → Set α} {t : ∀ i', κ' i' → Set α} (h : ∀ i j, ∃ i' j', s i j ⊆ t i' j') : ⋃ (i) (j), s i j ⊆ ⋃ (i') (j'), t i' j' := iSup₂_mono' h #align set.Union₂_mono' Set.iUnion₂_mono' theorem iInter_mono' {s : ι → Set α} {t : ι' → Set α} (h : ∀ j, ∃ i, s i ⊆ t j) : ⋂ i, s i ⊆ ⋂ j, t j := Set.subset_iInter fun j => let ⟨i, hi⟩ := h j iInter_subset_of_subset i hi #align set.Inter_mono' Set.iInter_mono' theorem iInter₂_mono' {s : ∀ i, κ i → Set α} {t : ∀ i', κ' i' → Set α} (h : ∀ i' j', ∃ i j, s i j ⊆ t i' j') : ⋂ (i) (j), s i j ⊆ ⋂ (i') (j'), t i' j' := subset_iInter₂_iff.2 fun i' j' => let ⟨_, _, hst⟩ := h i' j' (iInter₂_subset _ _).trans hst #align set.Inter₂_mono' Set.iInter₂_mono' theorem iUnion₂_subset_iUnion (κ : ι → Sort) (s : ι → Set α) : ⋃ (i) (_ : κ i), s i ⊆ ⋃ i, s i := iUnion_mono fun _ => iUnion_subset fun _ => Subset.rfl #align set.Union₂_subset_Union Set.iUnion₂_subset_iUnion theorem iInter_subset_iInter₂ (κ : ι → Sort) (s : ι → Set α) : ⋂ i, s i ⊆ ⋂ (i) (_ : κ i), s i := iInter_mono fun _ => subset_iInter fun _ => Subset.rfl #align set.Inter_subset_Inter₂ Set.iInter_subset_iInter₂ theorem iUnion_setOf (P : ι → α → Prop) : ⋃ i, { x : α \| P i x } = { x : α \| ∃ i, P i x } := by ext exact mem_iUnion #align set.Union_set_of Set.iUnion_setOf theorem iInter_setOf (P : ι → α → Prop) : ⋂ i, { x : α \| P i x } = { x : α \| ∀ i, P i x } := by ext exact mem_iInter #align set.Inter_set_of Set.iInter_setOf theorem iUnion_congr_of_surjective {f : ι → Set α} {g : ι₂ → Set α} (h : ι → ι₂) (h1 : Surjective h) (h2 : ∀ x, g (h x) = f x) : ⋃ x, f x = ⋃ y, g y := h1.iSup_congr h h2 #align set.Union_congr_of_surjective Set.iUnion_congr_of_surjective theorem iInter_congr_of_surjective {f : ι → Set α} {g : ι₂ → Set α} (h : ι → ι₂) (h1 : Surjective h) (h2 : ∀ x, g (h x) = f x) : ⋂ x, f x = ⋂ y, g y := h1.iInf_congr h h2 #align set.Inter_congr_of_surjective Set.iInter_congr_of_surjective lemma iUnion_congr {s t : ι → Set α} (h : ∀ i, s i = t i) : ⋃ i, s i = ⋃ i, t i := iSup_congr h #align set.Union_congr Set.iUnion_congr lemma iInter_congr {s t : ι → Set α} (h : ∀ i, s i = t i) : ⋂ i, s i = ⋂ i, t i := iInf_congr h #align set.Inter_congr Set.iInter_congr lemma iUnion₂_congr {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j = t i j) : ⋃ (i) (j), s i j = ⋃ (i) (j), t i j := iUnion_congr fun i => iUnion_congr <\| h i #align set.Union₂_congr Set.iUnion₂_congr lemma iInter₂_congr {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j = t i j) : ⋂ (i) (j), s i j = ⋂ (i) (j), t i j := iInter_congr fun i => iInter_congr <\| h i #align set.Inter₂_congr Set.iInter₂_congr @[simp] theorem compl_iUnion (s : ι → Set β) : (⋃ i, s i)ᶜ = ⋂ i, (s i)ᶜ := compl_iSup #align set.compl_Union Set.compl_iUnion theorem compl_iUnion₂ (s : ∀ i, κ i → Set α) : (⋃ (i) (j), s i j)ᶜ = ⋂ (i) (j), (s i j)ᶜ := by simp_rw [compl_iUnion] #align set.compl_Union₂ Set.compl_iUnion₂ @[simp] theorem compl_iInter (s : ι → Set β) : (⋂ i, s i)ᶜ = ⋃ i, (s i)ᶜ := compl_iInf #align set.compl_Inter Set.compl_iInter theorem compl_iInter₂ (s : ∀ i, κ i → Set α) : (⋂ (i) (j), s i j)ᶜ = ⋃ (i) (j), (s i j)ᶜ := by simp_rw [compl_iInter] #align set.compl_Inter₂ Set.compl_iInter₂ -- classical -- complete_boolean_algebra theorem iUnion_eq_compl_iInter_compl (s : ι → Set β) : ⋃ i, s i = (⋂ i, (s i)ᶜ)ᶜ := by simp only [compl_iInter, compl_compl] #align set.Union_eq_compl_Inter_compl Set.iUnion_eq_compl_iInter_compl -- classical -- complete_boolean_algebra theorem iInter_eq_compl_iUnion_compl (s : ι → Set β) : ⋂ i, s i = (⋃ i, (s i)ᶜ)ᶜ := by simp only [compl_iUnion, compl_compl] #align set.Inter_eq_compl_Union_compl Set.iInter_eq_compl_iUnion_compl theorem inter_iUnion (s : Set β) (t : ι → Set β) : (s ∩ ⋃ i, t i) = ⋃ i, s ∩ t i := inf_iSup_eq _ _ #align set.inter_Union Set.inter_iUnion theorem iUnion_inter (s : Set β) (t : ι → Set β) : (⋃ i, t i) ∩ s = ⋃ i, t i ∩ s := iSup_inf_eq _ _ #align set.Union_inter Set.iUnion_inter theorem iUnion_union_distrib (s : ι → Set β) (t : ι → Set β) : ⋃ i, s i ∪ t i = (⋃ i, s i) ∪ ⋃ i, t i := iSup_sup_eq #align set.Union_union_distrib Set.iUnion_union_distrib theorem iInter_inter_distrib (s : ι → Set β) (t : ι → Set β) : ⋂ i, s i ∩ t i = (⋂ i, s i) ∩ ⋂ i, t i := iInf_inf_eq #align set.Inter_inter_distrib Set.iInter_inter_distrib theorem union_iUnion [Nonempty ι] (s : Set β) (t : ι → Set β) : (s ∪ ⋃ i, t i) = ⋃ i, s ∪ t i := sup_iSup #align set.union_Union Set.union_iUnion theorem iUnion_union [Nonempty ι] (s : Set β) (t : ι → Set β) : (⋃ i, t i) ∪ s = ⋃ i, t i ∪ s := iSup_sup #align set.Union_union Set.iUnion_union theorem inter_iInter [Nonempty ι] (s : Set β) (t : ι → Set β) : (s ∩ ⋂ i, t i) = ⋂ i, s ∩ t i := inf_iInf #align set.inter_Inter Set.inter_iInter theorem iInter_inter [Nonempty ι] (s : Set β) (t : ι → Set β) : (⋂ i, t i) ∩ s = ⋂ i, t i ∩ s := iInf_inf #align set.Inter_inter Set.iInter_inter -- classical theorem union_iInter (s : Set β) (t : ι → Set β) : (s ∪ ⋂ i, t i) = ⋂ i, s ∪ t i := sup_iInf_eq _ _ #align set.union_Inter Set.union_iInter theorem iInter_union (s : ι → Set β) (t : Set β) : (⋂ i, s i) ∪ t = ⋂ i, s i ∪ t := iInf_sup_eq _ _ #align set.Inter_union Set.iInter_union theorem iUnion_diff (s : Set β) (t : ι → Set β) : (⋃ i, t i) \ s = ⋃ i, t i \ s := iUnion_inter _ _ #align set.Union_diff Set.iUnion_diff theorem diff_iUnion [Nonempty ι] (s : Set β) (t : ι → Set β) : (s \ ⋃ i, t i) = ⋂ i, s \ t i := by rw [diff_eq, compl_iUnion, inter_iInter]; rfl #align set.diff_Union Set.diff_iUnion theorem diff_iInter (s : Set β) (t : ι → Set β) : (s \ ⋂ i, t i) = ⋃ i, s \ t i := by rw [diff_eq, compl_iInter, inter_iUnion]; rfl #align set.diff_Inter Set.diff_iInter theorem iUnion_inter_subset {ι α} {s t : ι → Set α} : ⋃ i, s i ∩ t i ⊆ (⋃ i, s i) ∩ ⋃ i, t i := le_iSup_inf_iSup s t #align set.Union_inter_subset Set.iUnion_inter_subset theorem iUnion_inter_of_monotone {ι α} [Preorder ι] [IsDirected ι (· ≤ ·)] {s t : ι → Set α} (hs : Monotone s) (ht : Monotone t) : ⋃ i, s i ∩ t i = (⋃ i, s i) ∩ ⋃ i, t i := iSup_inf_of_monotone hs ht #align set.Union_inter_of_monotone Set.iUnion_inter_of_monotone theorem iUnion_inter_of_antitone {ι α} [Preorder ι] [IsDirected ι (swap (· ≤ ·))] {s t : ι → Set α} (hs : Antitone s) (ht : Antitone t) : ⋃ i, s i ∩ t i = (⋃ i, s i) ∩ ⋃ i, t i := iSup_inf_of_antitone hs ht #align set.Union_inter_of_antitone Set.iUnion_inter_of_antitone theorem iInter_union_of_monotone {ι α} [Preorder ι] [IsDirected ι (swap (· ≤ ·))] {s t : ι → Set α} (hs : Monotone s) (ht : Monotone t) : ⋂ i, s i ∪ t i = (⋂ i, s i) ∪ ⋂ i, t i := iInf_sup_of_monotone hs ht #align set.Inter_union_of_monotone Set.iInter_union_of_monotone theorem iInter_union_of_antitone {ι α} [Preorder ι] [IsDirected ι (· ≤ ·)] {s t : ι → Set α} (hs : Antitone s) (ht : Antitone t) : ⋂ i, s i ∪ t i = (⋂ i, s i) ∪ ⋂ i, t i := iInf_sup_of_antitone hs ht #align set.Inter_union_of_antitone Set.iInter_union_of_antitone theorem iUnion_iInter_subset {s : ι → ι' → Set α} : (⋃ j, ⋂ i, s i j) ⊆ ⋂ i, ⋃ j, s i j := iSup_iInf_le_iInf_iSup (flip s) #align set.Union_Inter_subset Set.iUnion_iInter_subset theorem iUnion_option {ι} (s : Option ι → Set α) : ⋃ o, s o = s none ∪ ⋃ i, s (some i) := iSup_option s #align set.Union_option Set.iUnion_option theorem iInter_option {ι} (s : Option ι → Set α) : ⋂ o, s o = s none ∩ ⋂ i, s (some i) := iInf_option s #align set.Inter_option Set.iInter_option section variable (p : ι → Prop) [DecidablePred p] theorem iUnion_dite (f : ∀ i, p i → Set α) (g : ∀ i, ¬p i → Set α) : ⋃ i, (if h : p i then f i h else g i h) = (⋃ (i) (h : p i), f i h) ∪ ⋃ (i) (h : ¬p i), g i h := iSup_dite _ _ _ #align set.Union_dite Set.iUnion_dite theorem iUnion_ite (f g : ι → Set α) : ⋃ i, (if p i then f i else g i) = (⋃ (i) (_ : p i), f i) ∪ ⋃ (i) (_ : ¬p i), g i := iUnion_dite _ _ _ #align set.Union_ite Set.iUnion_ite theorem iInter_dite (f : ∀ i, p i → Set α) (g : ∀ i, ¬p i → Set α) : ⋂ i, (if h : p i then f i h else g i h) = (⋂ (i) (h : p i), f i h) ∩ ⋂ (i) (h : ¬p i), g i h := iInf_dite _ _ _ #align set.Inter_dite Set.iInter_dite theorem iInter_ite (f g : ι → Set α) : ⋂ i, (if p i then f i else g i) = (⋂ (i) (_ : p i), f i) ∩ ⋂ (i) (_ : ¬p i), g i := iInter_dite _ _ _ #align set.Inter_ite Set.iInter_ite end theorem image_projection_prod {ι : Type} {α : ι → Type} {v : ∀ i : ι, Set (α i)} (hv : (pi univ v).Nonempty) (i : ι) : ((fun x : ∀ i : ι, α i => x i) '' ⋂ k, (fun x : ∀ j : ι, α j => x k) ⁻¹' v k) = v i := by classical apply Subset.antisymm · simp [iInter_subset] · intro y y_in simp only [mem_image, mem_iInter, mem_preimage] rcases hv with ⟨z, hz⟩ refine ⟨Function.update z i y, ?_, update_same i y z⟩ rw [@forall_update_iff ι α _ z i y fun i t => t ∈ v i] exact ⟨y_in, fun j _ => by simpa using hz j⟩ #align set.image_projection_prod Set.image_projection_prod theorem iInter_false {s : False → Set α} : iInter s = univ := iInf_false #align set.Inter_false Set.iInter_false theorem iUnion_false {s : False → Set α} : iUnion s = ∅ := iSup_false #align set.Union_false Set.iUnion_false @[simp] theorem iInter_true {s : True → Set α} : iInter s = s trivial := iInf_true #align set.Inter_true Set.iInter_true @[simp] theorem iUnion_true {s : True → Set α} : iUnion s = s trivial := iSup_true #align set.Union_true Set.iUnion_true @[simp] theorem iInter_exists {p : ι → Prop} {f : Exists p → Set α} : ⋂ x, f x = ⋂ (i) (h : p i), f ⟨i, h⟩ := iInf_exists #align set.Inter_exists Set.iInter_exists @[simp] theorem iUnion_exists {p : ι → Prop} {f : Exists p → Set α} : ⋃ x, f x = ⋃ (i) (h : p i), f ⟨i, h⟩ := iSup_exists #align set.Union_exists Set.iUnion_exists @[simp] theorem iUnion_empty : (⋃ _ : ι, ∅ : Set α) = ∅ := iSup_bot #align set.Union_empty Set.iUnion_empty @[simp] theorem iInter_univ : (⋂ _ : ι, univ : Set α) = univ := iInf_top #align set.Inter_univ Set.iInter_univ section variable {s : ι → Set α} @[simp] theorem iUnion_eq_empty : ⋃ i, s i = ∅ ↔ ∀ i, s i = ∅ := iSup_eq_bot #align set.Union_eq_empty Set.iUnion_eq_empty @[simp] theorem iInter_eq_univ : ⋂ i, s i = univ ↔ ∀ i, s i = univ := iInf_eq_top #align set.Inter_eq_univ Set.iInter_eq_univ @[simp] theorem nonempty_iUnion : (⋃ i, s i).Nonempty ↔ ∃ i, (s i).Nonempty := by simp [nonempty_iff_ne_empty] #align set.nonempty_Union Set.nonempty_iUnion -- Porting note (#10618): removing `simp`. `simp` can prove it theorem nonempty_biUnion {t : Set α} {s : α → Set β} : (⋃ i ∈ t, s i).Nonempty ↔ ∃ i ∈ t, (s i).Nonempty := by simp #align set.nonempty_bUnion Set.nonempty_biUnion theorem iUnion_nonempty_index (s : Set α) (t : s.Nonempty → Set β) : ⋃ h, t h = ⋃ x ∈ s, t ⟨x, ‹_›⟩ := iSup_exists #align set.Union_nonempty_index Set.iUnion_nonempty_index end @[simp] theorem iInter_iInter_eq_left {b : β} {s : ∀ x : β, x = b → Set α} : ⋂ (x) (h : x = b), s x h = s b rfl := iInf_iInf_eq_left #align set.Inter_Inter_eq_left Set.iInter_iInter_eq_left @[simp] theorem iInter_iInter_eq_right {b : β} {s : ∀ x : β, b = x → Set α} : ⋂ (x) (h : b = x), s x h = s b rfl := iInf_iInf_eq_right #align set.Inter_Inter_eq_right Set.iInter_iInter_eq_right @[simp] theorem iUnion_iUnion_eq_left {b : β} {s : ∀ x : β, x = b → Set α} : ⋃ (x) (h : x = b), s x h = s b rfl := iSup_iSup_eq_left #align set.Union_Union_eq_left Set.iUnion_iUnion_eq_left @[simp] theorem iUnion_iUnion_eq_right {b : β} {s : ∀ x : β, b = x → Set α} : ⋃ (x) (h : b = x), s x h = s b rfl := iSup_iSup_eq_right #align set.Union_Union_eq_right Set.iUnion_iUnion_eq_right theorem iInter_or {p q : Prop} (s : p ∨ q → Set α) : ⋂ h, s h = (⋂ h : p, s (Or.inl h)) ∩ ⋂ h : q, s (Or.inr h) := iInf_or #align set.Inter_or Set.iInter_or theorem iUnion_or {p q : Prop} (s : p ∨ q → Set α) : ⋃ h, s h = (⋃ i, s (Or.inl i)) ∪ ⋃ j, s (Or.inr j) := iSup_or #align set.Union_or Set.iUnion_or theorem iUnion_and {p q : Prop} (s : p ∧ q → Set α) : ⋃ h, s h = ⋃ (hp) (hq), s ⟨hp, hq⟩ := iSup_and #align set.Union_and Set.iUnion_and theorem iInter_and {p q : Prop} (s : p ∧ q → Set α) : ⋂ h, s h = ⋂ (hp) (hq), s ⟨hp, hq⟩ := iInf_and #align set.Inter_and Set.iInter_and theorem iUnion_comm (s : ι → ι' → Set α) : ⋃ (i) (i'), s i i' = ⋃ (i') (i), s i i' := iSup_comm #align set.Union_comm Set.iUnion_comm theorem iInter_comm (s : ι → ι' → Set α) : ⋂ (i) (i'), s i i' = ⋂ (i') (i), s i i' := iInf_comm #align set.Inter_comm Set.iInter_comm theorem iUnion_sigma {γ : α → Type} (s : Sigma γ → Set β) : ⋃ ia, s ia = ⋃ i, ⋃ a, s ⟨i, a⟩ := iSup_sigma theorem iUnion_sigma' {γ : α → Type} (s : ∀ i, γ i → Set β) : ⋃ i, ⋃ a, s i a = ⋃ ia : Sigma γ, s ia.1 ia.2 := iSup_sigma' _ theorem iInter_sigma {γ : α → Type} (s : Sigma γ → Set β) : ⋂ ia, s ia = ⋂ i, ⋂ a, s ⟨i, a⟩ := iInf_sigma theorem iInter_sigma' {γ : α → Type} (s : ∀ i, γ i → Set β) : ⋂ i, ⋂ a, s i a = ⋂ ia : Sigma γ, s ia.1 ia.2 := iInf_sigma' _ theorem iUnion₂_comm (s : ∀ i₁, κ₁ i₁ → ∀ i₂, κ₂ i₂ → Set α) : ⋃ (i₁) (j₁) (i₂) (j₂), s i₁ j₁ i₂ j₂ = ⋃ (i₂) (j₂) (i₁) (j₁), s i₁ j₁ i₂ j₂ := iSup₂_comm _ #align set.Union₂_comm Set.iUnion₂_comm theorem iInter₂_comm (s : ∀ i₁, κ₁ i₁ → ∀ i₂, κ₂ i₂ → Set α) : ⋂ (i₁) (j₁) (i₂) (j₂), s i₁ j₁ i₂ j₂ = ⋂ (i₂) (j₂) (i₁) (j₁), s i₁ j₁ i₂ j₂ := iInf₂_comm _ #align set.Inter₂_comm Set.iInter₂_comm @[simp] theorem biUnion_and (p : ι → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p x ∧ q x y → Set α) : ⋃ (x : ι) (y : ι') (h : p x ∧ q x y), s x y h = ⋃ (x : ι) (hx : p x) (y : ι') (hy : q x y), s x y ⟨hx, hy⟩ := by simp only [iUnion_and, @iUnion_comm _ ι'] #align set.bUnion_and Set.biUnion_and @[simp] theorem biUnion_and' (p : ι' → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p y ∧ q x y → Set α) : ⋃ (x : ι) (y : ι') (h : p y ∧ q x y), s x y h = ⋃ (y : ι') (hy : p y) (x : ι) (hx : q x y), s x y ⟨hy, hx⟩ := by simp only [iUnion_and, @iUnion_comm _ ι] #align set.bUnion_and' Set.biUnion_and' @[simp] theorem biInter_and (p : ι → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p x ∧ q x y → Set α) : ⋂ (x : ι) (y : ι') (h : p x ∧ q x y), s x y h = ⋂ (x : ι) (hx : p x) (y : ι') (hy : q x y), s x y ⟨hx, hy⟩ := by simp only [iInter_and, @iInter_comm _ ι'] #align set.bInter_and Set.biInter_and @[simp] theorem biInter_and' (p : ι' → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p y ∧ q x y → Set α) : ⋂ (x : ι) (y : ι') (h : p y ∧ q x y), s x y h = ⋂ (y : ι') (hy : p y) (x : ι) (hx : q x y), s x y ⟨hy, hx⟩ := by simp only [iInter_and, @iInter_comm _ ι] #align set.bInter_and' Set.biInter_and' @[simp] theorem iUnion_iUnion_eq_or_left {b : β} {p : β → Prop} {s : ∀ x : β, x = b ∨ p x → Set α} : ⋃ (x) (h), s x h = s b (Or.inl rfl) ∪ ⋃ (x) (h : p x), s x (Or.inr h) := by simp only [iUnion_or, iUnion_union_distrib, iUnion_iUnion_eq_left] #align set.Union_Union_eq_or_left Set.iUnion_iUnion_eq_or_left @[simp] theorem iInter_iInter_eq_or_left {b : β} {p : β → Prop} {s : ∀ x : β, x = b ∨ p x → Set α} : ⋂ (x) (h), s x h = s b (Or.inl rfl) ∩ ⋂ (x) (h : p x), s x (Or.inr h) := by simp only [iInter_or, iInter_inter_distrib, iInter_iInter_eq_left] #align set.Inter_Inter_eq_or_left Set.iInter_iInter_eq_or_left theorem mem_biUnion {s : Set α} {t : α → Set β} {x : α} {y : β} (xs : x ∈ s) (ytx : y ∈ t x) : y ∈ ⋃ x ∈ s, t x := mem_iUnion₂_of_mem xs ytx #align set.mem_bUnion Set.mem_biUnion theorem mem_biInter {s : Set α} {t : α → Set β} {y : β} (h : ∀ x ∈ s, y ∈ t x) : y ∈ ⋂ x ∈ s, t x := mem_iInter₂_of_mem h #align set.mem_bInter Set.mem_biInter theorem subset_biUnion_of_mem {s : Set α} {u : α → Set β} {x : α} (xs : x ∈ s) : u x ⊆ ⋃ x ∈ s, u x := -- Porting note: Why is this not just `subset_iUnion₂ x xs`? @subset_iUnion₂ β α (· ∈ s) (fun i _ => u i) x xs #align set.subset_bUnion_of_mem Set.subset_biUnion_of_mem theorem biInter_subset_of_mem {s : Set α} {t : α → Set β} {x : α} (xs : x ∈ s) : ⋂ x ∈ s, t x ⊆ t x := iInter₂_subset x xs #align set.bInter_subset_of_mem Set.biInter_subset_of_mem theorem biUnion_subset_biUnion_left {s s' : Set α} {t : α → Set β} (h : s ⊆ s') : ⋃ x ∈ s, t x ⊆ ⋃ x ∈ s', t x := iUnion₂_subset fun _ hx => subset_biUnion_of_mem <\| h hx #align set.bUnion_subset_bUnion_left Set.biUnion_subset_biUnion_left theorem biInter_subset_biInter_left {s s' : Set α} {t : α → Set β} (h : s' ⊆ s) : ⋂ x ∈ s, t x ⊆ ⋂ x ∈ s', t x := subset_iInter₂ fun _ hx => biInter_subset_of_mem <\| h hx #align set.bInter_subset_bInter_left Set.biInter_subset_biInter_left theorem biUnion_mono {s s' : Set α} {t t' : α → Set β} (hs : s' ⊆ s) (h : ∀ x ∈ s, t x ⊆ t' x) : ⋃ x ∈ s', t x ⊆ ⋃ x ∈ s, t' x := (biUnion_subset_biUnion_left hs).trans <\| iUnion₂_mono h #align set.bUnion_mono Set.biUnion_mono theorem biInter_mono {s s' : Set α} {t t' : α → Set β} (hs : s ⊆ s') (h : ∀ x ∈ s, t x ⊆ t' x) : ⋂ x ∈ s', t x ⊆ ⋂ x ∈ s, t' x := (biInter_subset_biInter_left hs).trans <\| iInter₂_mono h #align set.bInter_mono Set.biInter_mono theorem biUnion_eq_iUnion (s : Set α) (t : ∀ x ∈ s, Set β) : ⋃ x ∈ s, t x ‹_› = ⋃ x : s, t x x.2 := iSup_subtype' #align set.bUnion_eq_Union Set.biUnion_eq_iUnion theorem biInter_eq_iInter (s : Set α) (t : ∀ x ∈ s, Set β) : ⋂ x ∈ s, t x ‹_› = ⋂ x : s, t x x.2 := iInf_subtype' #align set.bInter_eq_Inter Set.biInter_eq_iInter theorem iUnion_subtype (p : α → Prop) (s : { x // p x } → Set β) : ⋃ x : { x // p x }, s x = ⋃ (x) (hx : p x), s ⟨x, hx⟩ := iSup_subtype #align set.Union_subtype Set.iUnion_subtype theorem iInter_subtype (p : α → Prop) (s : { x // p x } → Set β) : ⋂ x : { x // p x }, s x = ⋂ (x) (hx : p x), s ⟨x, hx⟩ := iInf_subtype #align set.Inter_subtype Set.iInter_subtype theorem biInter_empty (u : α → Set β) : ⋂ x ∈ (∅ : Set α), u x = univ := iInf_emptyset #align set.bInter_empty Set.biInter_empty theorem biInter_univ (u : α → Set β) : ⋂ x ∈ @univ α, u x = ⋂ x, u x := iInf_univ #align set.bInter_univ Set.biInter_univ @[simp] theorem biUnion_self (s : Set α) : ⋃ x ∈ s, s = s := Subset.antisymm (iUnion₂_subset fun _ _ => Subset.refl s) fun _ hx => mem_biUnion hx hx #align set.bUnion_self Set.biUnion_self @[simp] theorem iUnion_nonempty_self (s : Set α) : ⋃ _ : s.Nonempty, s = s := by rw [iUnion_nonempty_index, biUnion_self] #align set.Union_nonempty_self Set.iUnion_nonempty_self theorem biInter_singleton (a : α) (s : α → Set β) : ⋂ x ∈ ({a} : Set α), s x = s a := iInf_singleton #align set.bInter_singleton Set.biInter_singleton theorem biInter_union (s t : Set α) (u : α → Set β) : ⋂ x ∈ s ∪ t, u x = (⋂ x ∈ s, u x) ∩ ⋂ x ∈ t, u x := iInf_union #align set.bInter_union Set.biInter_union theorem biInter_insert (a : α) (s : Set α) (t : α → Set β) : ⋂ x ∈ insert a s, t x = t a ∩ ⋂ x ∈ s, t x := by simp #align set.bInter_insert Set.biInter_insert theorem biInter_pair (a b : α) (s : α → Set β) : ⋂ x ∈ ({a, b} : Set α), s x = s a ∩ s b := by rw [biInter_insert, biInter_singleton] #align set.bInter_pair Set.biInter_pair theorem biInter_inter {ι α : Type} {s : Set ι} (hs : s.Nonempty) (f : ι → Set α) (t : Set α) : ⋂ i ∈ s, f i ∩ t = (⋂ i ∈ s, f i) ∩ t := by haveI : Nonempty s := hs.to_subtype simp [biInter_eq_iInter, ← iInter_inter] #align set.bInter_inter Set.biInter_inter theorem inter_biInter {ι α : Type} {s : Set ι} (hs : s.Nonempty) (f : ι → Set α) (t : Set α) : ⋂ i ∈ s, t ∩ f i = t ∩ ⋂ i ∈ s, f i := by rw [inter_comm, ← biInter_inter hs] simp [inter_comm] #align set.inter_bInter Set.inter_biInter theorem biUnion_empty (s : α → Set β) : ⋃ x ∈ (∅ : Set α), s x = ∅ := iSup_emptyset #align set.bUnion_empty Set.biUnion_empty theorem biUnion_univ (s : α → Set β) : ⋃ x ∈ @univ α, s x = ⋃ x, s x := iSup_univ #align set.bUnion_univ Set.biUnion_univ theorem biUnion_singleton (a : α) (s : α → Set β) : ⋃ x ∈ ({a} : Set α), s x = s a := iSup_singleton #align set.bUnion_singleton Set.biUnion_singleton @[simp] theorem biUnion_of_singleton (s : Set α) : ⋃ x ∈ s, {x} = s := ext <\| by simp #align set.bUnion_of_singleton Set.biUnion_of_singleton theorem biUnion_union (s t : Set α) (u : α → Set β) : ⋃ x ∈ s ∪ t, u x = (⋃ x ∈ s, u x) ∪ ⋃ x ∈ t, u x := iSup_union #align set.bUnion_union Set.biUnion_union @[simp] theorem iUnion_coe_set {α β : Type} (s : Set α) (f : s → Set β) : ⋃ i, f i = ⋃ i ∈ s, f ⟨i, ‹i ∈ s›⟩ := iUnion_subtype _ _ #align set.Union_coe_set Set.iUnion_coe_set @[simp] theorem iInter_coe_set {α β : Type} (s : Set α) (f : s → Set β) : ⋂ i, f i = ⋂ i ∈ s, f ⟨i, ‹i ∈ s›⟩ := iInter_subtype _ _ #align set.Inter_coe_set Set.iInter_coe_set theorem biUnion_insert (a : α) (s : Set α) (t : α → Set β) : ⋃ x ∈ insert a s, t x = t a ∪ ⋃ x ∈ s, t x := by simp #align set.bUnion_insert Set.biUnion_insert theorem biUnion_pair (a b : α) (s : α → Set β) : ⋃ x ∈ ({a, b} : Set α), s x = s a ∪ s b := by simp #align set.bUnion_pair Set.biUnion_pair theorem inter_iUnion₂ (s : Set α) (t : ∀ i, κ i → Set α) : (s ∩ ⋃ (i) (j), t i j) = ⋃ (i) (j), s ∩ t i j := by simp only [inter_iUnion] #align set.inter_Union₂ Set.inter_iUnion₂ theorem iUnion₂_inter (s : ∀ i, κ i → Set α) (t : Set α) : (⋃ (i) (j), s i j) ∩ t = ⋃ (i) (j), s i j ∩ t := by simp_rw [iUnion_inter] #align set.Union₂_inter Set.iUnion₂_inter theorem union_iInter₂ (s : Set α) (t : ∀ i, κ i → Set α) : (s ∪ ⋂ (i) (j), t i j) = ⋂ (i) (j), s ∪ t i j := by simp_rw [union_iInter] #align set.union_Inter₂ Set.union_iInter₂ theorem iInter₂_union (s : ∀ i, κ i → Set α) (t : Set α) : (⋂ (i) (j), s i j) ∪ t = ⋂ (i) (j), s i j ∪ t := by simp_rw [iInter_union] #align set.Inter₂_union Set.iInter₂_union theorem mem_sUnion_of_mem {x : α} {t : Set α} {S : Set (Set α)} (hx : x ∈ t) (ht : t ∈ S) : x ∈ ⋃₀S := ⟨t, ht, hx⟩ #align set.mem_sUnion_of_mem Set.mem_sUnion_of_mem -- is this theorem really necessary? theorem not_mem_of_not_mem_sUnion {x : α} {t : Set α} {S : Set (Set α)} (hx : x ∉ ⋃₀S) (ht : t ∈ S) : x ∉ t := fun h => hx ⟨t, ht, h⟩ #align set.not_mem_of_not_mem_sUnion Set.not_mem_of_not_mem_sUnion theorem sInter_subset_of_mem {S : Set (Set α)} {t : Set α} (tS : t ∈ S) : ⋂₀ S ⊆ t := sInf_le tS #align set.sInter_subset_of_mem Set.sInter_subset_of_mem theorem subset_sUnion_of_mem {S : Set (Set α)} {t : Set α} (tS : t ∈ S) : t ⊆ ⋃₀S := le_sSup tS #align set.subset_sUnion_of_mem Set.subset_sUnion_of_mem theorem subset_sUnion_of_subset {s : Set α} (t : Set (Set α)) (u : Set α) (h₁ : s ⊆ u) (h₂ : u ∈ t) : s ⊆ ⋃₀t := Subset.trans h₁ (subset_sUnion_of_mem h₂) #align set.subset_sUnion_of_subset Set.subset_sUnion_of_subset theorem sUnion_subset {S : Set (Set α)} {t : Set α} (h : ∀ t' ∈ S, t' ⊆ t) : ⋃₀S ⊆ t := sSup_le h #align set.sUnion_subset Set.sUnion_subset @[simp] theorem sUnion_subset_iff {s : Set (Set α)} {t : Set α} : ⋃₀s ⊆ t ↔ ∀ t' ∈ s, t' ⊆ t := sSup_le_iff #align set.sUnion_subset_iff Set.sUnion_subset_iff lemma sUnion_mono_subsets {s : Set (Set α)} {f : Set α → Set α} (hf : ∀ t : Set α, t ⊆ f t) : ⋃₀ s ⊆ ⋃₀ (f '' s) := fun _ ⟨t, htx, hxt⟩ ↦ ⟨f t, mem_image_of_mem f htx, hf t hxt⟩ lemma sUnion_mono_supsets {s : Set (Set α)} {f : Set α → Set α} (hf : ∀ t : Set α, f t ⊆ t) : ⋃₀ (f '' s) ⊆ ⋃₀ s := -- If t ∈ f '' s is arbitrary; t = f u for some u : Set α. fun _ ⟨_, ⟨u, hus, hut⟩, hxt⟩ ↦ ⟨u, hus, (hut ▸ hf u) hxt⟩ theorem subset_sInter {S : Set (Set α)} {t : Set α} (h : ∀ t' ∈ S, t ⊆ t') : t ⊆ ⋂₀ S := le_sInf h #align set.subset_sInter Set.subset_sInter @[simp] theorem subset_sInter_iff {S : Set (Set α)} {t : Set α} : t ⊆ ⋂₀ S ↔ ∀ t' ∈ S, t ⊆ t' := le_sInf_iff #align set.subset_sInter_iff Set.subset_sInter_iff @[gcongr] theorem sUnion_subset_sUnion {S T : Set (Set α)} (h : S ⊆ T) : ⋃₀S ⊆ ⋃₀T := sUnion_subset fun _ hs => subset_sUnion_of_mem (h hs) #align set.sUnion_subset_sUnion Set.sUnion_subset_sUnion @[gcongr] theorem sInter_subset_sInter {S T : Set (Set α)} (h : S ⊆ T) : ⋂₀ T ⊆ ⋂₀ S := subset_sInter fun _ hs => sInter_subset_of_mem (h hs) #align set.sInter_subset_sInter Set.sInter_subset_sInter @[simp] theorem sUnion_empty : ⋃₀∅ = (∅ : Set α) := sSup_empty #align set.sUnion_empty Set.sUnion_empty @[simp] theorem sInter_empty : ⋂₀ ∅ = (univ : Set α) := sInf_empty #align set.sInter_empty Set.sInter_empty @[simp] theorem sUnion_singleton (s : Set α) : ⋃₀{s} = s := sSup_singleton #align set.sUnion_singleton Set.sUnion_singleton @[simp] theorem sInter_singleton (s : Set α) : ⋂₀ {s} = s := sInf_singleton #align set.sInter_singleton Set.sInter_singleton @[simp] theorem sUnion_eq_empty {S : Set (Set α)} : ⋃₀S = ∅ ↔ ∀ s ∈ S, s = ∅ := sSup_eq_bot #align set.sUnion_eq_empty Set.sUnion_eq_empty @[simp] theorem sInter_eq_univ {S : Set (Set α)} : ⋂₀ S = univ ↔ ∀ s ∈ S, s = univ := sInf_eq_top #align set.sInter_eq_univ Set.sInter_eq_univ theorem subset_powerset_iff {s : Set (Set α)} {t : Set α} : s ⊆ 𝒫 t ↔ ⋃₀ s ⊆ t := sUnion_subset_iff.symm theorem sUnion_powerset_gc : GaloisConnection (⋃₀ · : Set (Set α) → Set α) (𝒫 · : Set α → Set (Set α)) := gc_sSup_Iic def sUnion_powerset_gi : GaloisInsertion (⋃₀ · : Set (Set α) → Set α) (𝒫 · : Set α → Set (Set α)) := gi_sSup_Iic theorem sUnion_mem_empty_univ {S : Set (Set α)} (h : S ⊆ {∅, univ}) : ⋃₀ S ∈ ({∅, univ} : Set (Set α)) := by simp only [mem_insert_iff, mem_singleton_iff, or_iff_not_imp_left, sUnion_eq_empty, not_forall] rintro ⟨s, hs, hne⟩ obtain rfl : s = univ := (h hs).resolve_left hne exact univ_subset_iff.1 <\| subset_sUnion_of_mem hs @[simp] theorem nonempty_sUnion {S : Set (Set α)} : (⋃₀S).Nonempty ↔ ∃ s ∈ S, Set.Nonempty s := by simp [nonempty_iff_ne_empty] #align set.nonempty_sUnion Set.nonempty_sUnion theorem Nonempty.of_sUnion {s : Set (Set α)} (h : (⋃₀s).Nonempty) : s.Nonempty := let ⟨s, hs, _⟩ := nonempty_sUnion.1 h ⟨s, hs⟩ #align set.nonempty.of_sUnion Set.Nonempty.of_sUnion theorem Nonempty.of_sUnion_eq_univ [Nonempty α] {s : Set (Set α)} (h : ⋃₀s = univ) : s.Nonempty := Nonempty.of_sUnion <\| h.symm ▸ univ_nonempty #align set.nonempty.of_sUnion_eq_univ Set.Nonempty.of_sUnion_eq_univ theorem sUnion_union (S T : Set (Set α)) : ⋃₀(S ∪ T) = ⋃₀S ∪ ⋃₀T := sSup_union #align set.sUnion_union Set.sUnion_union theorem sInter_union (S T : Set (Set α)) : ⋂₀ (S ∪ T) = ⋂₀ S ∩ ⋂₀ T := sInf_union #align set.sInter_union Set.sInter_union @[simp] theorem sUnion_insert (s : Set α) (T : Set (Set α)) : ⋃₀insert s T = s ∪ ⋃₀T := sSup_insert #align set.sUnion_insert Set.sUnion_insert @[simp] theorem sInter_insert (s : Set α) (T : Set (Set α)) : ⋂₀ insert s T = s ∩ ⋂₀ T := sInf_insert #align set.sInter_insert Set.sInter_insert @[simp] theorem sUnion_diff_singleton_empty (s : Set (Set α)) : ⋃₀(s \ {∅}) = ⋃₀s := sSup_diff_singleton_bot s #align set.sUnion_diff_singleton_empty Set.sUnion_diff_singleton_empty @[simp] theorem sInter_diff_singleton_univ (s : Set (Set α)) : ⋂₀ (s \ {univ}) = ⋂₀ s := sInf_diff_singleton_top s #align set.sInter_diff_singleton_univ Set.sInter_diff_singleton_univ theorem sUnion_pair (s t : Set α) : ⋃₀{s, t} = s ∪ t := sSup_pair #align set.sUnion_pair Set.sUnion_pair theorem sInter_pair (s t : Set α) : ⋂₀ {s, t} = s ∩ t := sInf_pair #align set.sInter_pair Set.sInter_pair @[simp] theorem sUnion_image (f : α → Set β) (s : Set α) : ⋃₀(f '' s) = ⋃ x ∈ s, f x := sSup_image #align set.sUnion_image Set.sUnion_image @[simp] theorem sInter_image (f : α → Set β) (s : Set α) : ⋂₀ (f '' s) = ⋂ x ∈ s, f x := sInf_image #align set.sInter_image Set.sInter_image @[simp] theorem sUnion_range (f : ι → Set β) : ⋃₀range f = ⋃ x, f x := rfl #align set.sUnion_range Set.sUnion_range @[simp] theorem sInter_range (f : ι → Set β) : ⋂₀ range f = ⋂ x, f x := rfl #align set.sInter_range Set.sInter_range theorem iUnion_eq_univ_iff {f : ι → Set α} : ⋃ i, f i = univ ↔ ∀ x, ∃ i, x ∈ f i := by simp only [eq_univ_iff_forall, mem_iUnion] #align set.Union_eq_univ_iff Set.iUnion_eq_univ_iff theorem iUnion₂_eq_univ_iff {s : ∀ i, κ i → Set α} : ⋃ (i) (j), s i j = univ ↔ ∀ a, ∃ i j, a ∈ s i j := by simp only [iUnion_eq_univ_iff, mem_iUnion] #align set.Union₂_eq_univ_iff Set.iUnion₂_eq_univ_iff theorem sUnion_eq_univ_iff {c : Set (Set α)} : ⋃₀c = univ ↔ ∀ a, ∃ b ∈ c, a ∈ b := by simp only [eq_univ_iff_forall, mem_sUnion] #align set.sUnion_eq_univ_iff Set.sUnion_eq_univ_iff -- classical theorem iInter_eq_empty_iff {f : ι → Set α} : ⋂ i, f i = ∅ ↔ ∀ x, ∃ i, x ∉ f i := by simp [Set.eq_empty_iff_forall_not_mem] #align set.Inter_eq_empty_iff Set.iInter_eq_empty_iff -- classical theorem iInter₂_eq_empty_iff {s : ∀ i, κ i → Set α} : ⋂ (i) (j), s i j = ∅ ↔ ∀ a, ∃ i j, a ∉ s i j := by simp only [eq_empty_iff_forall_not_mem, mem_iInter, not_forall] #align set.Inter₂_eq_empty_iff Set.iInter₂_eq_empty_iff -- classical theorem sInter_eq_empty_iff {c : Set (Set α)} : ⋂₀ c = ∅ ↔ ∀ a, ∃ b ∈ c, a ∉ b := by simp [Set.eq_empty_iff_forall_not_mem] #align set.sInter_eq_empty_iff Set.sInter_eq_empty_iff -- classical @[simp] theorem nonempty_iInter {f : ι → Set α} : (⋂ i, f i).Nonempty ↔ ∃ x, ∀ i, x ∈ f i := by simp [nonempty_iff_ne_empty, iInter_eq_empty_iff] #align set.nonempty_Inter Set.nonempty_iInter -- classical -- Porting note (#10618): removing `simp`. `simp` can prove it theorem nonempty_iInter₂ {s : ∀ i, κ i → Set α} : (⋂ (i) (j), s i j).Nonempty ↔ ∃ a, ∀ i j, a ∈ s i j := by simp #align set.nonempty_Inter₂ Set.nonempty_iInter₂ -- classical @[simp] theorem nonempty_sInter {c : Set (Set α)} : (⋂₀ c).Nonempty ↔ ∃ a, ∀ b ∈ c, a ∈ b := by simp [nonempty_iff_ne_empty, sInter_eq_empty_iff] #align set.nonempty_sInter Set.nonempty_sInter -- classical theorem compl_sUnion (S : Set (Set α)) : (⋃₀S)ᶜ = ⋂₀ (compl '' S) := ext fun x => by simp #align set.compl_sUnion Set.compl_sUnion -- classical theorem sUnion_eq_compl_sInter_compl (S : Set (Set α)) : ⋃₀S = (⋂₀ (compl '' S))ᶜ := by rw [← compl_compl (⋃₀S), compl_sUnion] #align set.sUnion_eq_compl_sInter_compl Set.sUnion_eq_compl_sInter_compl -- classical theorem compl_sInter (S : Set (Set α)) : (⋂₀ S)ᶜ = ⋃₀(compl '' S) := by rw [sUnion_eq_compl_sInter_compl, compl_compl_image] #align set.compl_sInter Set.compl_sInter -- classical theorem sInter_eq_compl_sUnion_compl (S : Set (Set α)) : ⋂₀ S = (⋃₀(compl '' S))ᶜ := by rw [← compl_compl (⋂₀ S), compl_sInter] #align set.sInter_eq_compl_sUnion_compl Set.sInter_eq_compl_sUnion_compl theorem inter_empty_of_inter_sUnion_empty {s t : Set α} {S : Set (Set α)} (hs : t ∈ S) (h : s ∩ ⋃₀S = ∅) : s ∩ t = ∅ := eq_empty_of_subset_empty <\| by rw [← h]; exact inter_subset_inter_right _ (subset_sUnion_of_mem hs) #align set.inter_empty_of_inter_sUnion_empty Set.inter_empty_of_inter_sUnion_empty theorem range_sigma_eq_iUnion_range {γ : α → Type} (f : Sigma γ → β) : range f = ⋃ a, range fun b => f ⟨a, b⟩ := Set.ext <\| by simp #align set.range_sigma_eq_Union_range Set.range_sigma_eq_iUnion_range theorem iUnion_eq_range_sigma (s : α → Set β) : ⋃ i, s i = range fun a : Σi, s i => a.2 := by simp [Set.ext_iff] #align set.Union_eq_range_sigma Set.iUnion_eq_range_sigma theorem iUnion_eq_range_psigma (s : ι → Set β) : ⋃ i, s i = range fun a : Σ'i, s i => a.2 := by simp [Set.ext_iff] #align set.Union_eq_range_psigma Set.iUnion_eq_range_psigma theorem iUnion_image_preimage_sigma_mk_eq_self {ι : Type} {σ : ι → Type} (s : Set (Sigma σ)) : ⋃ i, Sigma.mk i '' (Sigma.mk i ⁻¹' s) = s := by ext x simp only [mem_iUnion, mem_image, mem_preimage] constructor · rintro ⟨i, a, h, rfl⟩ exact h · intro h cases' x with i a exact ⟨i, a, h, rfl⟩ #align set.Union_image_preimage_sigma_mk_eq_self Set.iUnion_image_preimage_sigma_mk_eq_self theorem Sigma.univ (X : α → Type) : (Set.univ : Set (Σa, X a)) = ⋃ a, range (Sigma.mk a) := Set.ext fun x => iff_of_true trivial ⟨range (Sigma.mk x.1), Set.mem_range_self _, x.2, Sigma.eta x⟩ #align set.sigma.univ Set.Sigma.univ alias sUnion_mono := sUnion_subset_sUnion #align set.sUnion_mono Set.sUnion_mono theorem iUnion_subset_iUnion_const {s : Set α} (h : ι → ι₂) : ⋃ _ : ι, s ⊆ ⋃ _ : ι₂, s := iSup_const_mono (α := Set α) h #align set.Union_subset_Union_const Set.iUnion_subset_iUnion_const @[simp] theorem iUnion_singleton_eq_range {α β : Type} (f : α → β) : ⋃ x : α, {f x} = range f := by ext x simp [@eq_comm _ x] #align set.Union_singleton_eq_range Set.iUnion_singleton_eq_range theorem iUnion_of_singleton (α : Type) : (⋃ x, {x} : Set α) = univ := by simp [Set.ext_iff] #align set.Union_of_singleton Set.iUnion_of_singleton theorem iUnion_of_singleton_coe (s : Set α) : ⋃ i : s, ({(i : α)} : Set α) = s := by simp #align set.Union_of_singleton_coe Set.iUnion_of_singleton_coe theorem sUnion_eq_biUnion {s : Set (Set α)} : ⋃₀s = ⋃ (i : Set α) (_ : i ∈ s), i := by rw [← sUnion_image, image_id'] #align set.sUnion_eq_bUnion Set.sUnion_eq_biUnion theorem sInter_eq_biInter {s : Set (Set α)} : ⋂₀ s = ⋂ (i : Set α) (_ : i ∈ s), i := by rw [← sInter_image, image_id'] #align set.sInter_eq_bInter Set.sInter_eq_biInter theorem sUnion_eq_iUnion {s : Set (Set α)} : ⋃₀s = ⋃ i : s, i := by simp only [← sUnion_range, Subtype.range_coe] #align set.sUnion_eq_Union Set.sUnion_eq_iUnion theorem sInter_eq_iInter {s : Set (Set α)} : ⋂₀ s = ⋂ i : s, i := by simp only [← sInter_range, Subtype.range_coe] #align set.sInter_eq_Inter Set.sInter_eq_iInter @[simp] theorem iUnion_of_empty [IsEmpty ι] (s : ι → Set α) : ⋃ i, s i = ∅ := iSup_of_empty _ #align set.Union_of_empty Set.iUnion_of_empty @[simp] theorem iInter_of_empty [IsEmpty ι] (s : ι → Set α) : ⋂ i, s i = univ := iInf_of_empty _ #align set.Inter_of_empty Set.iInter_of_empty theorem union_eq_iUnion {s₁ s₂ : Set α} : s₁ ∪ s₂ = ⋃ b : Bool, cond b s₁ s₂ := sup_eq_iSup s₁ s₂ #align set.union_eq_Union Set.union_eq_iUnion theorem inter_eq_iInter {s₁ s₂ : Set α} : s₁ ∩ s₂ = ⋂ b : Bool, cond b s₁ s₂ := inf_eq_iInf s₁ s₂ #align set.inter_eq_Inter Set.inter_eq_iInter theorem sInter_union_sInter {S T : Set (Set α)} : ⋂₀ S ∪ ⋂₀ T = ⋂ p ∈ S ×ˢ T, (p : Set α × Set α).1 ∪ p.2 := sInf_sup_sInf #align set.sInter_union_sInter Set.sInter_union_sInter theorem sUnion_inter_sUnion {s t : Set (Set α)} : ⋃₀s ∩ ⋃₀t = ⋃ p ∈ s ×ˢ t, (p : Set α × Set α).1 ∩ p.2 := sSup_inf_sSup #align set.sUnion_inter_sUnion Set.sUnion_inter_sUnion theorem biUnion_iUnion (s : ι → Set α) (t : α → Set β) : ⋃ x ∈ ⋃ i, s i, t x = ⋃ (i) (x ∈ s i), t x := by simp [@iUnion_comm _ ι] #align set.bUnion_Union Set.biUnion_iUnion theorem biInter_iUnion (s : ι → Set α) (t : α → Set β) : ⋂ x ∈ ⋃ i, s i, t x = ⋂ (i) (x ∈ s i), t x := by simp [@iInter_comm _ ι] #align set.bInter_Union Set.biInter_iUnion theorem sUnion_iUnion (s : ι → Set (Set α)) : ⋃₀⋃ i, s i = ⋃ i, ⋃₀s i := by simp only [sUnion_eq_biUnion, biUnion_iUnion] #align set.sUnion_Union Set.sUnion_iUnion theorem sInter_iUnion (s : ι → Set (Set α)) : ⋂₀ ⋃ i, s i = ⋂ i, ⋂₀ s i := by simp only [sInter_eq_biInter, biInter_iUnion] #align set.sInter_Union Set.sInter_iUnion theorem iUnion_range_eq_sUnion {α β : Type*} (C : Set (Set α)) {f : ∀ s : C, β → (s : Type _)} (hf : ∀ s : C, Surjective (f s)) : ⋃ y : β, range (fun s : C => (f s y).val) = ⋃₀C := by ext x; constructor · rintro ⟨s, ⟨y, rfl⟩, ⟨s, hs⟩, rfl⟩ refine ⟨_, hs, ?_⟩ exact (f ⟨s, hs⟩ y).2 · rintro ⟨s, hs, hx⟩ cases' hf ⟨s, hs⟩ ⟨x, hx⟩ with y hy refine ⟨_, ⟨y, rfl⟩, ⟨s, hs⟩, ?_⟩ exact congr_arg Subtype.val hy #align set.Union_range_eq_sUnion Set.iUnion_range_eq_sUnion theorem iUnion_range_eq_iUnion (C : ι → Set α) {f : ∀ x : ι, β → C x} (hf : ∀ x : ι, Surjective (f x)) : ⋃ y : β, range (fun x : ι => (f x y).val) = ⋃ x, C x := by ext x; rw [mem_iUnion, mem_iUnion]; constructor · rintro ⟨y, i, rfl⟩ exact ⟨i, (f i y).2⟩ · rintro ⟨i, hx⟩ cases' hf i ⟨x, hx⟩ with y hy exact ⟨y, i, congr_arg Subtype.val hy⟩ #align set.Union_range_eq_Union Set.iUnion_range_eq_iUnion theorem union_distrib_iInter_left (s : ι → Set α) (t : Set α) : (t ∪ ⋂ i, s i) = ⋂ i, t ∪ s i := sup_iInf_eq _ _ #align set.union_distrib_Inter_left Set.union_distrib_iInter_left theorem union_distrib_iInter₂_left (s : Set α) (t : ∀ i, κ i → Set α) : (s ∪ ⋂ (i) (j), t i j) = ⋂ (i) (j), s ∪ t i j := by simp_rw [union_distrib_iInter_left] #align set.union_distrib_Inter₂_left Set.union_distrib_iInter₂_left theorem union_distrib_iInter_right (s : ι → Set α) (t : Set α) : (⋂ i, s i) ∪ t = ⋂ i, s i ∪ t := iInf_sup_eq _ _ #align set.union_distrib_Inter_right Set.union_distrib_iInter_right theorem union_distrib_iInter₂_right (s : ∀ i, κ i → Set α) (t : Set α) : (⋂ (i) (j), s i j) ∪ t = ⋂ (i) (j), s i j ∪ t := by simp_rw [union_distrib_iInter_right] #align set.union_distrib_Inter₂_right Set.union_distrib_iInter₂_right section Seq theorem seq_def {s : Set (α → β)} {t : Set α} : seq s t = ⋃ f ∈ s, f '' t := by rw [seq_eq_image2, iUnion_image_left] #align set.seq_def Set.seq_def theorem seq_subset {s : Set (α → β)} {t : Set α} {u : Set β} : seq s t ⊆ u ↔ ∀ f ∈ s, ∀ a ∈ t, (f : α → β) a ∈ u := image2_subset_iff #align set.seq_subset Set.seq_subset @[gcongr] theorem seq_mono {s₀ s₁ : Set (α → β)} {t₀ t₁ : Set α} (hs : s₀ ⊆ s₁) (ht : t₀ ⊆ t₁) : seq s₀ t₀ ⊆ seq s₁ t₁ := image2_subset hs ht #align set.seq_mono Set.seq_mono theorem singleton_seq {f : α → β} {t : Set α} : Set.seq ({f} : Set (α → β)) t = f '' t := image2_singleton_left #align set.singleton_seq Set.singleton_seq theorem seq_singleton {s : Set (α → β)} {a : α} : Set.seq s {a} = (fun f : α → β => f a) '' s := image2_singleton_right #align set.seq_singleton Set.seq_singleton theorem seq_seq {s : Set (β → γ)} {t : Set (α → β)} {u : Set α} : seq s (seq t u) = seq (seq ((· ∘ ·) '' s) t) u := by simp only [seq_eq_image2, image2_image_left] exact .symm <\| image2_assoc fun _ _ _ ↦ rfl #align set.seq_seq Set.seq_seq theorem image_seq {f : β → γ} {s : Set (α → β)} {t : Set α} : f '' seq s t = seq ((f ∘ ·) '' s) t := by simp only [seq, image_image2, image2_image_left, comp_apply] #align set.image_seq Set.image_seq	Mathlib/Data/Set/Lattice.lean	1,963	1,964	theorem prod_eq_seq {s : Set α} {t : Set β} : s ×ˢ t = (Prod.mk '' s).seq t := by	rw [seq_eq_image2, image2_image_left, image2_mk_eq_prod]
import Mathlib.Analysis.Analytic.Basic import Mathlib.Analysis.Analytic.Composition import Mathlib.Analysis.Analytic.Linear import Mathlib.Analysis.Calculus.FDeriv.Analytic import Mathlib.Geometry.Manifold.ChartedSpace import Mathlib.Analysis.NormedSpace.FiniteDimension import Mathlib.Analysis.Calculus.ContDiff.Basic #align_import geometry.manifold.smooth_manifold_with_corners from "leanprover-community/mathlib"@"ddec54a71a0dd025c05445d467f1a2b7d586a3ba" noncomputable section universe u v w u' v' w' open Set Filter Function open scoped Manifold Filter Topology scoped[Manifold] notation "∞" => (⊤ : ℕ∞) @[ext] -- Porting note(#5171): was nolint has_nonempty_instance structure ModelWithCorners (𝕜 : Type) [NontriviallyNormedField 𝕜] (E : Type) [NormedAddCommGroup E] [NormedSpace 𝕜 E] (H : Type) [TopologicalSpace H] extends PartialEquiv H E where source_eq : source = univ unique_diff' : UniqueDiffOn 𝕜 toPartialEquiv.target continuous_toFun : Continuous toFun := by continuity continuous_invFun : Continuous invFun := by continuity #align model_with_corners ModelWithCorners attribute [simp, mfld_simps] ModelWithCorners.source_eq def modelWithCornersSelf (𝕜 : Type) [NontriviallyNormedField 𝕜] (E : Type) [NormedAddCommGroup E] [NormedSpace 𝕜 E] : ModelWithCorners 𝕜 E E where toPartialEquiv := PartialEquiv.refl E source_eq := rfl unique_diff' := uniqueDiffOn_univ continuous_toFun := continuous_id continuous_invFun := continuous_id #align model_with_corners_self modelWithCornersSelf @[inherit_doc] scoped[Manifold] notation "𝓘(" 𝕜 ", " E ")" => modelWithCornersSelf 𝕜 E scoped[Manifold] notation "𝓘(" 𝕜 ")" => modelWithCornersSelf 𝕜 𝕜 section variable {𝕜 : Type} [NontriviallyNormedField 𝕜] {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {H : Type} [TopologicalSpace H] (I : ModelWithCorners 𝕜 E H) namespace ModelWithCorners @[coe] def toFun' (e : ModelWithCorners 𝕜 E H) : H → E := e.toFun instance : CoeFun (ModelWithCorners 𝕜 E H) fun _ => H → E := ⟨toFun'⟩ protected def symm : PartialEquiv E H := I.toPartialEquiv.symm #align model_with_corners.symm ModelWithCorners.symm def Simps.apply (𝕜 : Type) [NontriviallyNormedField 𝕜] (E : Type) [NormedAddCommGroup E] [NormedSpace 𝕜 E] (H : Type) [TopologicalSpace H] (I : ModelWithCorners 𝕜 E H) : H → E := I #align model_with_corners.simps.apply ModelWithCorners.Simps.apply def Simps.symm_apply (𝕜 : Type) [NontriviallyNormedField 𝕜] (E : Type) [NormedAddCommGroup E] [NormedSpace 𝕜 E] (H : Type) [TopologicalSpace H] (I : ModelWithCorners 𝕜 E H) : E → H := I.symm #align model_with_corners.simps.symm_apply ModelWithCorners.Simps.symm_apply initialize_simps_projections ModelWithCorners (toFun → apply, invFun → symm_apply) -- Register a few lemmas to make sure that `simp` puts expressions in normal form @[simp, mfld_simps] theorem toPartialEquiv_coe : (I.toPartialEquiv : H → E) = I := rfl #align model_with_corners.to_local_equiv_coe ModelWithCorners.toPartialEquiv_coe @[simp, mfld_simps] theorem mk_coe (e : PartialEquiv H E) (a b c d) : ((ModelWithCorners.mk e a b c d : ModelWithCorners 𝕜 E H) : H → E) = (e : H → E) := rfl #align model_with_corners.mk_coe ModelWithCorners.mk_coe @[simp, mfld_simps] theorem toPartialEquiv_coe_symm : (I.toPartialEquiv.symm : E → H) = I.symm := rfl #align model_with_corners.to_local_equiv_coe_symm ModelWithCorners.toPartialEquiv_coe_symm @[simp, mfld_simps] theorem mk_symm (e : PartialEquiv H E) (a b c d) : (ModelWithCorners.mk e a b c d : ModelWithCorners 𝕜 E H).symm = e.symm := rfl #align model_with_corners.mk_symm ModelWithCorners.mk_symm @[continuity] protected theorem continuous : Continuous I := I.continuous_toFun #align model_with_corners.continuous ModelWithCorners.continuous protected theorem continuousAt {x} : ContinuousAt I x := I.continuous.continuousAt #align model_with_corners.continuous_at ModelWithCorners.continuousAt protected theorem continuousWithinAt {s x} : ContinuousWithinAt I s x := I.continuousAt.continuousWithinAt #align model_with_corners.continuous_within_at ModelWithCorners.continuousWithinAt @[continuity] theorem continuous_symm : Continuous I.symm := I.continuous_invFun #align model_with_corners.continuous_symm ModelWithCorners.continuous_symm theorem continuousAt_symm {x} : ContinuousAt I.symm x := I.continuous_symm.continuousAt #align model_with_corners.continuous_at_symm ModelWithCorners.continuousAt_symm theorem continuousWithinAt_symm {s x} : ContinuousWithinAt I.symm s x := I.continuous_symm.continuousWithinAt #align model_with_corners.continuous_within_at_symm ModelWithCorners.continuousWithinAt_symm theorem continuousOn_symm {s} : ContinuousOn I.symm s := I.continuous_symm.continuousOn #align model_with_corners.continuous_on_symm ModelWithCorners.continuousOn_symm @[simp, mfld_simps] theorem target_eq : I.target = range (I : H → E) := by rw [← image_univ, ← I.source_eq] exact I.image_source_eq_target.symm #align model_with_corners.target_eq ModelWithCorners.target_eq protected theorem unique_diff : UniqueDiffOn 𝕜 (range I) := I.target_eq ▸ I.unique_diff' #align model_with_corners.unique_diff ModelWithCorners.unique_diff @[simp, mfld_simps] protected theorem left_inv (x : H) : I.symm (I x) = x := by refine I.left_inv' ?_; simp #align model_with_corners.left_inv ModelWithCorners.left_inv protected theorem leftInverse : LeftInverse I.symm I := I.left_inv #align model_with_corners.left_inverse ModelWithCorners.leftInverse theorem injective : Injective I := I.leftInverse.injective #align model_with_corners.injective ModelWithCorners.injective @[simp, mfld_simps] theorem symm_comp_self : I.symm ∘ I = id := I.leftInverse.comp_eq_id #align model_with_corners.symm_comp_self ModelWithCorners.symm_comp_self protected theorem rightInvOn : RightInvOn I.symm I (range I) := I.leftInverse.rightInvOn_range #align model_with_corners.right_inv_on ModelWithCorners.rightInvOn @[simp, mfld_simps] protected theorem right_inv {x : E} (hx : x ∈ range I) : I (I.symm x) = x := I.rightInvOn hx #align model_with_corners.right_inv ModelWithCorners.right_inv theorem preimage_image (s : Set H) : I ⁻¹' (I '' s) = s := I.injective.preimage_image s #align model_with_corners.preimage_image ModelWithCorners.preimage_image protected theorem image_eq (s : Set H) : I '' s = I.symm ⁻¹' s ∩ range I := by refine (I.toPartialEquiv.image_eq_target_inter_inv_preimage ?_).trans ?_ · rw [I.source_eq]; exact subset_univ _ · rw [inter_comm, I.target_eq, I.toPartialEquiv_coe_symm] #align model_with_corners.image_eq ModelWithCorners.image_eq protected theorem closedEmbedding : ClosedEmbedding I := I.leftInverse.closedEmbedding I.continuous_symm I.continuous #align model_with_corners.closed_embedding ModelWithCorners.closedEmbedding theorem isClosed_range : IsClosed (range I) := I.closedEmbedding.isClosed_range #align model_with_corners.closed_range ModelWithCorners.isClosed_range @[deprecated (since := "2024-03-17")] alias closed_range := isClosed_range theorem map_nhds_eq (x : H) : map I (𝓝 x) = 𝓝[range I] I x := I.closedEmbedding.toEmbedding.map_nhds_eq x #align model_with_corners.map_nhds_eq ModelWithCorners.map_nhds_eq theorem map_nhdsWithin_eq (s : Set H) (x : H) : map I (𝓝[s] x) = 𝓝[I '' s] I x := I.closedEmbedding.toEmbedding.map_nhdsWithin_eq s x #align model_with_corners.map_nhds_within_eq ModelWithCorners.map_nhdsWithin_eq theorem image_mem_nhdsWithin {x : H} {s : Set H} (hs : s ∈ 𝓝 x) : I '' s ∈ 𝓝[range I] I x := I.map_nhds_eq x ▸ image_mem_map hs #align model_with_corners.image_mem_nhds_within ModelWithCorners.image_mem_nhdsWithin theorem symm_map_nhdsWithin_image {x : H} {s : Set H} : map I.symm (𝓝[I '' s] I x) = 𝓝[s] x := by rw [← I.map_nhdsWithin_eq, map_map, I.symm_comp_self, map_id] #align model_with_corners.symm_map_nhds_within_image ModelWithCorners.symm_map_nhdsWithin_image theorem symm_map_nhdsWithin_range (x : H) : map I.symm (𝓝[range I] I x) = 𝓝 x := by rw [← I.map_nhds_eq, map_map, I.symm_comp_self, map_id] #align model_with_corners.symm_map_nhds_within_range ModelWithCorners.symm_map_nhdsWithin_range theorem unique_diff_preimage {s : Set H} (hs : IsOpen s) : UniqueDiffOn 𝕜 (I.symm ⁻¹' s ∩ range I) := by rw [inter_comm] exact I.unique_diff.inter (hs.preimage I.continuous_invFun) #align model_with_corners.unique_diff_preimage ModelWithCorners.unique_diff_preimage theorem unique_diff_preimage_source {β : Type} [TopologicalSpace β] {e : PartialHomeomorph H β} : UniqueDiffOn 𝕜 (I.symm ⁻¹' e.source ∩ range I) := I.unique_diff_preimage e.open_source #align model_with_corners.unique_diff_preimage_source ModelWithCorners.unique_diff_preimage_source theorem unique_diff_at_image {x : H} : UniqueDiffWithinAt 𝕜 (range I) (I x) := I.unique_diff _ (mem_range_self _) #align model_with_corners.unique_diff_at_image ModelWithCorners.unique_diff_at_image theorem symm_continuousWithinAt_comp_right_iff {X} [TopologicalSpace X] {f : H → X} {s : Set H} {x : H} : ContinuousWithinAt (f ∘ I.symm) (I.symm ⁻¹' s ∩ range I) (I x) ↔ ContinuousWithinAt f s x := by refine ⟨fun h => ?_, fun h => ?_⟩ · have := h.comp I.continuousWithinAt (mapsTo_preimage _ _) simp_rw [preimage_inter, preimage_preimage, I.left_inv, preimage_id', preimage_range, inter_univ] at this rwa [Function.comp.assoc, I.symm_comp_self] at this · rw [← I.left_inv x] at h; exact h.comp I.continuousWithinAt_symm inter_subset_left #align model_with_corners.symm_continuous_within_at_comp_right_iff ModelWithCorners.symm_continuousWithinAt_comp_right_iff protected theorem locallyCompactSpace [LocallyCompactSpace E] (I : ModelWithCorners 𝕜 E H) : LocallyCompactSpace H := by have : ∀ x : H, (𝓝 x).HasBasis (fun s => s ∈ 𝓝 (I x) ∧ IsCompact s) fun s => I.symm '' (s ∩ range I) := fun x ↦ by rw [← I.symm_map_nhdsWithin_range] exact ((compact_basis_nhds (I x)).inf_principal _).map _ refine .of_hasBasis this ?_ rintro x s ⟨-, hsc⟩ exact (hsc.inter_right I.isClosed_range).image I.continuous_symm #align model_with_corners.locally_compact ModelWithCorners.locallyCompactSpace open TopologicalSpace protected theorem secondCountableTopology [SecondCountableTopology E] (I : ModelWithCorners 𝕜 E H) : SecondCountableTopology H := I.closedEmbedding.toEmbedding.secondCountableTopology #align model_with_corners.second_countable_topology ModelWithCorners.secondCountableTopology end ModelWithCorners section variable (𝕜 E) @[simp, mfld_simps] theorem modelWithCornersSelf_partialEquiv : 𝓘(𝕜, E).toPartialEquiv = PartialEquiv.refl E := rfl #align model_with_corners_self_local_equiv modelWithCornersSelf_partialEquiv @[simp, mfld_simps] theorem modelWithCornersSelf_coe : (𝓘(𝕜, E) : E → E) = id := rfl #align model_with_corners_self_coe modelWithCornersSelf_coe @[simp, mfld_simps] theorem modelWithCornersSelf_coe_symm : (𝓘(𝕜, E).symm : E → E) = id := rfl #align model_with_corners_self_coe_symm modelWithCornersSelf_coe_symm end end section variable (𝕜 E) @[simp, mfld_simps] theorem modelWithCornersSelf_partialEquiv : 𝓘(𝕜, E).toPartialEquiv = PartialEquiv.refl E := rfl #align model_with_corners_self_local_equiv modelWithCornersSelf_partialEquiv @[simp, mfld_simps] theorem modelWithCornersSelf_coe : (𝓘(𝕜, E) : E → E) = id := rfl #align model_with_corners_self_coe modelWithCornersSelf_coe @[simp, mfld_simps] theorem modelWithCornersSelf_coe_symm : (𝓘(𝕜, E).symm : E → E) = id := rfl #align model_with_corners_self_coe_symm modelWithCornersSelf_coe_symm end end theorem PartialHomeomorph.singleton_smoothManifoldWithCorners {𝕜 : Type} [NontriviallyNormedField 𝕜] {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {H : Type} [TopologicalSpace H] (I : ModelWithCorners 𝕜 E H) {M : Type} [TopologicalSpace M] (e : PartialHomeomorph M H) (h : e.source = Set.univ) : @SmoothManifoldWithCorners 𝕜 _ E _ _ H _ I M _ (e.singletonChartedSpace h) := @SmoothManifoldWithCorners.mk' _ _ _ _ _ _ _ _ _ _ (id _) <\| e.singleton_hasGroupoid h (contDiffGroupoid ∞ I) #align local_homeomorph.singleton_smooth_manifold_with_corners PartialHomeomorph.singleton_smoothManifoldWithCorners theorem OpenEmbedding.singleton_smoothManifoldWithCorners {𝕜 : Type} [NontriviallyNormedField 𝕜] {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {H : Type} [TopologicalSpace H] (I : ModelWithCorners 𝕜 E H) {M : Type} [TopologicalSpace M] [Nonempty M] {f : M → H} (h : OpenEmbedding f) : @SmoothManifoldWithCorners 𝕜 _ E _ _ H _ I M _ h.singletonChartedSpace := (h.toPartialHomeomorph f).singleton_smoothManifoldWithCorners I (by simp) #align open_embedding.singleton_smooth_manifold_with_corners OpenEmbedding.singleton_smoothManifoldWithCorners section ExtendedCharts open scoped Topology variable {𝕜 E M H E' M' H' : Type} [NontriviallyNormedField 𝕜] [NormedAddCommGroup E] [NormedSpace 𝕜 E] [TopologicalSpace H] [TopologicalSpace M] (f f' : PartialHomeomorph M H) (I : ModelWithCorners 𝕜 E H) [NormedAddCommGroup E'] [NormedSpace 𝕜 E'] [TopologicalSpace H'] [TopologicalSpace M'] (I' : ModelWithCorners 𝕜 E' H') {s t : Set M} namespace PartialHomeomorph @[simp, mfld_simps] def extend : PartialEquiv M E := f.toPartialEquiv ≫ I.toPartialEquiv #align local_homeomorph.extend PartialHomeomorph.extend theorem extend_coe : ⇑(f.extend I) = I ∘ f := rfl #align local_homeomorph.extend_coe PartialHomeomorph.extend_coe theorem extend_coe_symm : ⇑(f.extend I).symm = f.symm ∘ I.symm := rfl #align local_homeomorph.extend_coe_symm PartialHomeomorph.extend_coe_symm theorem extend_source : (f.extend I).source = f.source := by rw [extend, PartialEquiv.trans_source, I.source_eq, preimage_univ, inter_univ] #align local_homeomorph.extend_source PartialHomeomorph.extend_source theorem isOpen_extend_source : IsOpen (f.extend I).source := by rw [extend_source] exact f.open_source #align local_homeomorph.is_open_extend_source PartialHomeomorph.isOpen_extend_source theorem extend_target : (f.extend I).target = I.symm ⁻¹' f.target ∩ range I := by simp_rw [extend, PartialEquiv.trans_target, I.target_eq, I.toPartialEquiv_coe_symm, inter_comm] #align local_homeomorph.extend_target PartialHomeomorph.extend_target theorem extend_target' : (f.extend I).target = I '' f.target := by rw [extend, PartialEquiv.trans_target'', I.source_eq, univ_inter, I.toPartialEquiv_coe] lemma isOpen_extend_target [I.Boundaryless] : IsOpen (f.extend I).target := by rw [extend_target, I.range_eq_univ, inter_univ] exact I.continuous_symm.isOpen_preimage _ f.open_target theorem mapsTo_extend (hs : s ⊆ f.source) : MapsTo (f.extend I) s ((f.extend I).symm ⁻¹' s ∩ range I) := by rw [mapsTo', extend_coe, extend_coe_symm, preimage_comp, ← I.image_eq, image_comp, f.image_eq_target_inter_inv_preimage hs] exact image_subset _ inter_subset_right #align local_homeomorph.maps_to_extend PartialHomeomorph.mapsTo_extend theorem extend_left_inv {x : M} (hxf : x ∈ f.source) : (f.extend I).symm (f.extend I x) = x := (f.extend I).left_inv <\| by rwa [f.extend_source] #align local_homeomorph.extend_left_inv PartialHomeomorph.extend_left_inv lemma extend_left_inv' (ht: t ⊆ f.source) : ((f.extend I).symm ∘ (f.extend I)) '' t = t := EqOn.image_eq_self (fun _ hx ↦ f.extend_left_inv I (ht hx)) theorem extend_source_mem_nhds {x : M} (h : x ∈ f.source) : (f.extend I).source ∈ 𝓝 x := (isOpen_extend_source f I).mem_nhds <\| by rwa [f.extend_source I] #align local_homeomorph.extend_source_mem_nhds PartialHomeomorph.extend_source_mem_nhds theorem extend_source_mem_nhdsWithin {x : M} (h : x ∈ f.source) : (f.extend I).source ∈ 𝓝[s] x := mem_nhdsWithin_of_mem_nhds <\| extend_source_mem_nhds f I h #align local_homeomorph.extend_source_mem_nhds_within PartialHomeomorph.extend_source_mem_nhdsWithin theorem continuousOn_extend : ContinuousOn (f.extend I) (f.extend I).source := by refine I.continuous.comp_continuousOn ?_ rw [extend_source] exact f.continuousOn #align local_homeomorph.continuous_on_extend PartialHomeomorph.continuousOn_extend theorem continuousAt_extend {x : M} (h : x ∈ f.source) : ContinuousAt (f.extend I) x := (continuousOn_extend f I).continuousAt <\| extend_source_mem_nhds f I h #align local_homeomorph.continuous_at_extend PartialHomeomorph.continuousAt_extend theorem map_extend_nhds {x : M} (hy : x ∈ f.source) : map (f.extend I) (𝓝 x) = 𝓝[range I] f.extend I x := by rwa [extend_coe, comp_apply, ← I.map_nhds_eq, ← f.map_nhds_eq, map_map] #align local_homeomorph.map_extend_nhds PartialHomeomorph.map_extend_nhds theorem map_extend_nhds_of_boundaryless [I.Boundaryless] {x : M} (hx : x ∈ f.source) : map (f.extend I) (𝓝 x) = 𝓝 (f.extend I x) := by rw [f.map_extend_nhds _ hx, I.range_eq_univ, nhdsWithin_univ] theorem extend_target_mem_nhdsWithin {y : M} (hy : y ∈ f.source) : (f.extend I).target ∈ 𝓝[range I] f.extend I y := by rw [← PartialEquiv.image_source_eq_target, ← map_extend_nhds f I hy] exact image_mem_map (extend_source_mem_nhds _ _ hy) #align local_homeomorph.extend_target_mem_nhds_within PartialHomeomorph.extend_target_mem_nhdsWithin	Mathlib/Geometry/Manifold/SmoothManifoldWithCorners.lean	1,041	1,044	theorem extend_image_nhd_mem_nhds_of_boundaryless [I.Boundaryless] {x} (hx : x ∈ f.source) {s : Set M} (h : s ∈ 𝓝 x) : (f.extend I) '' s ∈ 𝓝 ((f.extend I) x) := by	rw [← f.map_extend_nhds_of_boundaryless _ hx, Filter.mem_map] filter_upwards [h] using subset_preimage_image (f.extend I) s
import Mathlib.RingTheory.IntegralClosure import Mathlib.RingTheory.FractionalIdeal.Basic #align_import ring_theory.fractional_ideal from "leanprover-community/mathlib"@"ed90a7d327c3a5caf65a6faf7e8a0d63c4605df7" open IsLocalization Pointwise nonZeroDivisors namespace FractionalIdeal open Set Submodule variable {R : Type} [CommRing R] {S : Submonoid R} {P : Type} [CommRing P] variable [Algebra R P] [loc : IsLocalization S P] section variable {P' : Type} [CommRing P'] [Algebra R P'] [loc' : IsLocalization S P'] variable {P'' : Type} [CommRing P''] [Algebra R P''] [loc'' : IsLocalization S P''] theorem _root_.IsFractional.map (g : P →ₐ[R] P') {I : Submodule R P} : IsFractional S I → IsFractional S (Submodule.map g.toLinearMap I) \| ⟨a, a_nonzero, hI⟩ => ⟨a, a_nonzero, fun b hb => by obtain ⟨b', b'_mem, hb'⟩ := Submodule.mem_map.mp hb rw [AlgHom.toLinearMap_apply] at hb' obtain ⟨x, hx⟩ := hI b' b'_mem use x rw [← g.commutes, hx, g.map_smul, hb']⟩ #align is_fractional.map IsFractional.map def map (g : P →ₐ[R] P') : FractionalIdeal S P → FractionalIdeal S P' := fun I => ⟨Submodule.map g.toLinearMap I, I.isFractional.map g⟩ #align fractional_ideal.map FractionalIdeal.map @[simp, norm_cast] theorem coe_map (g : P →ₐ[R] P') (I : FractionalIdeal S P) : ↑(map g I) = Submodule.map g.toLinearMap I := rfl #align fractional_ideal.coe_map FractionalIdeal.coe_map @[simp] theorem mem_map {I : FractionalIdeal S P} {g : P →ₐ[R] P'} {y : P'} : y ∈ I.map g ↔ ∃ x, x ∈ I ∧ g x = y := Submodule.mem_map #align fractional_ideal.mem_map FractionalIdeal.mem_map variable (I J : FractionalIdeal S P) (g : P →ₐ[R] P') @[simp] theorem map_id : I.map (AlgHom.id _ _) = I := coeToSubmodule_injective (Submodule.map_id (I : Submodule R P)) #align fractional_ideal.map_id FractionalIdeal.map_id @[simp] theorem map_comp (g' : P' →ₐ[R] P'') : I.map (g'.comp g) = (I.map g).map g' := coeToSubmodule_injective (Submodule.map_comp g.toLinearMap g'.toLinearMap I) #align fractional_ideal.map_comp FractionalIdeal.map_comp @[simp, norm_cast] theorem map_coeIdeal (I : Ideal R) : (I : FractionalIdeal S P).map g = I := by ext x simp only [mem_coeIdeal] constructor · rintro ⟨_, ⟨y, hy, rfl⟩, rfl⟩ exact ⟨y, hy, (g.commutes y).symm⟩ · rintro ⟨y, hy, rfl⟩ exact ⟨_, ⟨y, hy, rfl⟩, g.commutes y⟩ #align fractional_ideal.map_coe_ideal FractionalIdeal.map_coeIdeal @[simp] theorem map_one : (1 : FractionalIdeal S P).map g = 1 := map_coeIdeal g ⊤ #align fractional_ideal.map_one FractionalIdeal.map_one @[simp] theorem map_zero : (0 : FractionalIdeal S P).map g = 0 := map_coeIdeal g 0 #align fractional_ideal.map_zero FractionalIdeal.map_zero @[simp] theorem map_add : (I + J).map g = I.map g + J.map g := coeToSubmodule_injective (Submodule.map_sup _ _ _) #align fractional_ideal.map_add FractionalIdeal.map_add @[simp] theorem map_mul : (I * J).map g = I.map g * J.map g := by simp only [mul_def] exact coeToSubmodule_injective (Submodule.map_mul _ _ _) #align fractional_ideal.map_mul FractionalIdeal.map_mul @[simp] theorem map_map_symm (g : P ≃ₐ[R] P') : (I.map (g : P →ₐ[R] P')).map (g.symm : P' →ₐ[R] P) = I := by rw [← map_comp, g.symm_comp, map_id] #align fractional_ideal.map_map_symm FractionalIdeal.map_map_symm @[simp] theorem map_symm_map (I : FractionalIdeal S P') (g : P ≃ₐ[R] P') : (I.map (g.symm : P' →ₐ[R] P)).map (g : P →ₐ[R] P') = I := by rw [← map_comp, g.comp_symm, map_id] #align fractional_ideal.map_symm_map FractionalIdeal.map_symm_map theorem map_mem_map {f : P →ₐ[R] P'} (h : Function.Injective f) {x : P} {I : FractionalIdeal S P} : f x ∈ map f I ↔ x ∈ I := mem_map.trans ⟨fun ⟨_, hx', x'_eq⟩ => h x'_eq ▸ hx', fun h => ⟨x, h, rfl⟩⟩ #align fractional_ideal.map_mem_map FractionalIdeal.map_mem_map theorem map_injective (f : P →ₐ[R] P') (h : Function.Injective f) : Function.Injective (map f : FractionalIdeal S P → FractionalIdeal S P') := fun _ _ hIJ => ext fun _ => (map_mem_map h).symm.trans (hIJ.symm ▸ map_mem_map h) #align fractional_ideal.map_injective FractionalIdeal.map_injective def mapEquiv (g : P ≃ₐ[R] P') : FractionalIdeal S P ≃+* FractionalIdeal S P' where toFun := map g invFun := map g.symm map_add' I J := map_add I J _ map_mul' I J := map_mul I J _ left_inv I := by rw [← map_comp, AlgEquiv.symm_comp, map_id] right_inv I := by rw [← map_comp, AlgEquiv.comp_symm, map_id] #align fractional_ideal.map_equiv FractionalIdeal.mapEquiv @[simp] theorem coeFun_mapEquiv (g : P ≃ₐ[R] P') : (mapEquiv g : FractionalIdeal S P → FractionalIdeal S P') = map g := rfl #align fractional_ideal.coe_fun_map_equiv FractionalIdeal.coeFun_mapEquiv @[simp] theorem mapEquiv_apply (g : P ≃ₐ[R] P') (I : FractionalIdeal S P) : mapEquiv g I = map (↑g) I := rfl #align fractional_ideal.map_equiv_apply FractionalIdeal.mapEquiv_apply @[simp] theorem mapEquiv_symm (g : P ≃ₐ[R] P') : ((mapEquiv g).symm : FractionalIdeal S P' ≃+* _) = mapEquiv g.symm := rfl #align fractional_ideal.map_equiv_symm FractionalIdeal.mapEquiv_symm @[simp] theorem mapEquiv_refl : mapEquiv AlgEquiv.refl = RingEquiv.refl (FractionalIdeal S P) := RingEquiv.ext fun x => by simp #align fractional_ideal.map_equiv_refl FractionalIdeal.mapEquiv_refl theorem isFractional_span_iff {s : Set P} : IsFractional S (span R s) ↔ ∃ a ∈ S, ∀ b : P, b ∈ s → IsInteger R (a • b) := ⟨fun ⟨a, a_mem, h⟩ => ⟨a, a_mem, fun b hb => h b (subset_span hb)⟩, fun ⟨a, a_mem, h⟩ => ⟨a, a_mem, fun b hb => span_induction hb h (by rw [smul_zero] exact isInteger_zero) (fun x y hx hy => by rw [smul_add] exact isInteger_add hx hy) fun s x hx => by rw [smul_comm] exact isInteger_smul hx⟩⟩ #align fractional_ideal.is_fractional_span_iff FractionalIdeal.isFractional_span_iff theorem isFractional_of_fg {I : Submodule R P} (hI : I.FG) : IsFractional S I := by rcases hI with ⟨I, rfl⟩ rcases exist_integer_multiples_of_finset S I with ⟨⟨s, hs1⟩, hs⟩ rw [isFractional_span_iff] exact ⟨s, hs1, hs⟩ #align fractional_ideal.is_fractional_of_fg FractionalIdeal.isFractional_of_fg theorem mem_span_mul_finite_of_mem_mul {I J : FractionalIdeal S P} {x : P} (hx : x ∈ I * J) : ∃ T T' : Finset P, (T : Set P) ⊆ I ∧ (T' : Set P) ⊆ J ∧ x ∈ span R (T * T' : Set P) := Submodule.mem_span_mul_finite_of_mem_mul (by simpa using mem_coe.mpr hx) #align fractional_ideal.mem_span_mul_finite_of_mem_mul FractionalIdeal.mem_span_mul_finite_of_mem_mul variable (S) theorem coeIdeal_fg (inj : Function.Injective (algebraMap R P)) (I : Ideal R) : FG ((I : FractionalIdeal S P) : Submodule R P) ↔ I.FG := coeSubmodule_fg _ inj _ #align fractional_ideal.coe_ideal_fg FractionalIdeal.coeIdeal_fg variable {S} theorem fg_unit (I : (FractionalIdeal S P)ˣ) : FG (I : Submodule R P) := Submodule.fg_unit <\| Units.map (coeSubmoduleHom S P).toMonoidHom I #align fractional_ideal.fg_unit FractionalIdeal.fg_unit theorem fg_of_isUnit (I : FractionalIdeal S P) (h : IsUnit I) : FG (I : Submodule R P) := fg_unit h.unit #align fractional_ideal.fg_of_is_unit FractionalIdeal.fg_of_isUnit theorem _root_.Ideal.fg_of_isUnit (inj : Function.Injective (algebraMap R P)) (I : Ideal R) (h : IsUnit (I : FractionalIdeal S P)) : I.FG := by rw [← coeIdeal_fg S inj I] exact FractionalIdeal.fg_of_isUnit I h #align ideal.fg_of_is_unit Ideal.fg_of_isUnit variable (S P P') noncomputable irreducible_def canonicalEquiv : FractionalIdeal S P ≃+* FractionalIdeal S P' := mapEquiv { ringEquivOfRingEquiv P P' (RingEquiv.refl R) (show S.map _ = S by rw [RingEquiv.toMonoidHom_refl, Submonoid.map_id]) with commutes' := fun r => ringEquivOfRingEquiv_eq _ _ } #align fractional_ideal.canonical_equiv FractionalIdeal.canonicalEquiv @[simp] theorem mem_canonicalEquiv_apply {I : FractionalIdeal S P} {x : P'} : x ∈ canonicalEquiv S P P' I ↔ ∃ y ∈ I, IsLocalization.map P' (RingHom.id R) (fun y (hy : y ∈ S) => show RingHom.id R y ∈ S from hy) (y : P) = x := by rw [canonicalEquiv, mapEquiv_apply, mem_map] exact ⟨fun ⟨y, mem, Eq⟩ => ⟨y, mem, Eq⟩, fun ⟨y, mem, Eq⟩ => ⟨y, mem, Eq⟩⟩ #align fractional_ideal.mem_canonical_equiv_apply FractionalIdeal.mem_canonicalEquiv_apply @[simp] theorem canonicalEquiv_symm : (canonicalEquiv S P P').symm = canonicalEquiv S P' P := RingEquiv.ext fun I => SetLike.ext_iff.mpr fun x => by rw [mem_canonicalEquiv_apply, canonicalEquiv, mapEquiv_symm, mapEquiv_apply, mem_map] exact ⟨fun ⟨y, mem, Eq⟩ => ⟨y, mem, Eq⟩, fun ⟨y, mem, Eq⟩ => ⟨y, mem, Eq⟩⟩ #align fractional_ideal.canonical_equiv_symm FractionalIdeal.canonicalEquiv_symm theorem canonicalEquiv_flip (I) : canonicalEquiv S P P' (canonicalEquiv S P' P I) = I := by rw [← canonicalEquiv_symm]; erw [RingEquiv.apply_symm_apply] #align fractional_ideal.canonical_equiv_flip FractionalIdeal.canonicalEquiv_flip @[simp] theorem canonicalEquiv_canonicalEquiv (P'' : Type) [CommRing P''] [Algebra R P''] [IsLocalization S P''] (I : FractionalIdeal S P) : canonicalEquiv S P' P'' (canonicalEquiv S P P' I) = canonicalEquiv S P P'' I := by ext simp only [IsLocalization.map_map, RingHomInvPair.comp_eq₂, mem_canonicalEquiv_apply, exists_prop, exists_exists_and_eq_and] #align fractional_ideal.canonical_equiv_canonical_equiv FractionalIdeal.canonicalEquiv_canonicalEquiv theorem canonicalEquiv_trans_canonicalEquiv (P'' : Type) [CommRing P''] [Algebra R P''] [IsLocalization S P''] : (canonicalEquiv S P P').trans (canonicalEquiv S P' P'') = canonicalEquiv S P P'' := RingEquiv.ext (canonicalEquiv_canonicalEquiv S P P' P'') #align fractional_ideal.canonical_equiv_trans_canonical_equiv FractionalIdeal.canonicalEquiv_trans_canonicalEquiv @[simp] theorem canonicalEquiv_coeIdeal (I : Ideal R) : canonicalEquiv S P P' I = I := by ext simp [IsLocalization.map_eq] #align fractional_ideal.canonical_equiv_coe_ideal FractionalIdeal.canonicalEquiv_coeIdeal @[simp] theorem canonicalEquiv_self : canonicalEquiv S P P = RingEquiv.refl _ := by rw [← canonicalEquiv_trans_canonicalEquiv S P P] convert (canonicalEquiv S P P).symm_trans_self exact (canonicalEquiv_symm S P P).symm #align fractional_ideal.canonical_equiv_self FractionalIdeal.canonicalEquiv_self end section PrincipalIdeal variable {R₁ : Type} [CommRing R₁] {K : Type} [Field K] variable [Algebra R₁ K] [IsFractionRing R₁ K] open scoped Classical variable (R₁) -- Porting note: `@[simps]` generated a `Subtype.val` coercion instead of a -- `FractionalIdeal.coeToSubmodule` coercion def spanFinset {ι : Type} (s : Finset ι) (f : ι → K) : FractionalIdeal R₁⁰ K := ⟨Submodule.span R₁ (f '' s), by obtain ⟨a', ha'⟩ := IsLocalization.exist_integer_multiples R₁⁰ s f refine ⟨a', a'.2, fun x hx => Submodule.span_induction hx ?_ ?_ ?_ ?_⟩ · rintro _ ⟨i, hi, rfl⟩ exact ha' i hi · rw [smul_zero] exact IsLocalization.isInteger_zero · intro x y hx hy rw [smul_add] exact IsLocalization.isInteger_add hx hy · intro c x hx rw [smul_comm] exact IsLocalization.isInteger_smul hx⟩ #align fractional_ideal.span_finset FractionalIdeal.spanFinset @[simp] lemma spanFinset_coe {ι : Type} (s : Finset ι) (f : ι → K) : (spanFinset R₁ s f : Submodule R₁ K) = Submodule.span R₁ (f '' s) := rfl variable {R₁} @[simp] theorem spanFinset_eq_zero {ι : Type} {s : Finset ι} {f : ι → K} : spanFinset R₁ s f = 0 ↔ ∀ j ∈ s, f j = 0 := by simp only [← coeToSubmodule_inj, spanFinset_coe, coe_zero, Submodule.span_eq_bot, Set.mem_image, Finset.mem_coe, forall_exists_index, and_imp, forall_apply_eq_imp_iff₂] #align fractional_ideal.span_finset_eq_zero FractionalIdeal.spanFinset_eq_zero theorem spanFinset_ne_zero {ι : Type} {s : Finset ι} {f : ι → K} : spanFinset R₁ s f ≠ 0 ↔ ∃ j ∈ s, f j ≠ 0 := by simp #align fractional_ideal.span_finset_ne_zero FractionalIdeal.spanFinset_ne_zero open Submodule.IsPrincipal theorem isFractional_span_singleton (x : P) : IsFractional S (span R {x} : Submodule R P) := let ⟨a, ha⟩ := exists_integer_multiple S x isFractional_span_iff.mpr ⟨a, a.2, fun _ hx' => (Set.mem_singleton_iff.mp hx').symm ▸ ha⟩ #align fractional_ideal.is_fractional_span_singleton FractionalIdeal.isFractional_span_singleton variable (S) irreducible_def spanSingleton (x : P) : FractionalIdeal S P := ⟨span R {x}, isFractional_span_singleton x⟩ #align fractional_ideal.span_singleton FractionalIdeal.spanSingleton -- local attribute [semireducible] span_singleton @[simp] theorem coe_spanSingleton (x : P) : (spanSingleton S x : Submodule R P) = span R {x} := by rw [spanSingleton] rfl #align fractional_ideal.coe_span_singleton FractionalIdeal.coe_spanSingleton @[simp] theorem mem_spanSingleton {x y : P} : x ∈ spanSingleton S y ↔ ∃ z : R, z • y = x := by rw [spanSingleton] exact Submodule.mem_span_singleton #align fractional_ideal.mem_span_singleton FractionalIdeal.mem_spanSingleton theorem mem_spanSingleton_self (x : P) : x ∈ spanSingleton S x := (mem_spanSingleton S).mpr ⟨1, one_smul _ _⟩ #align fractional_ideal.mem_span_singleton_self FractionalIdeal.mem_spanSingleton_self variable (P) in theorem den_mul_self_eq_num' (I : FractionalIdeal S P) : spanSingleton S (algebraMap R P I.den) * I = I.num := by apply coeToSubmodule_injective dsimp only rw [coe_mul, ← smul_eq_mul, coe_spanSingleton, smul_eq_mul, Submodule.span_singleton_mul] convert I.den_mul_self_eq_num using 1 ext erw [Set.mem_smul_set, Set.mem_smul_set] simp [Algebra.smul_def] variable {S} @[simp] theorem spanSingleton_le_iff_mem {x : P} {I : FractionalIdeal S P} : spanSingleton S x ≤ I ↔ x ∈ I := by rw [← coe_le_coe, coe_spanSingleton, Submodule.span_singleton_le_iff_mem, mem_coe] #align fractional_ideal.span_singleton_le_iff_mem FractionalIdeal.spanSingleton_le_iff_mem theorem spanSingleton_eq_spanSingleton [NoZeroSMulDivisors R P] {x y : P} : spanSingleton S x = spanSingleton S y ↔ ∃ z : Rˣ, z • x = y := by rw [← Submodule.span_singleton_eq_span_singleton, spanSingleton, spanSingleton] exact Subtype.mk_eq_mk #align fractional_ideal.span_singleton_eq_span_singleton FractionalIdeal.spanSingleton_eq_spanSingleton	Mathlib/RingTheory/FractionalIdeal/Operations.lean	670	674	theorem eq_spanSingleton_of_principal (I : FractionalIdeal S P) [IsPrincipal (I : Submodule R P)] : I = spanSingleton S (generator (I : Submodule R P)) := by	-- Porting note: this used to be `coeToSubmodule_injective (span_singleton_generator ↑I).symm` -- but Lean 4 struggled to unify everything. Turned it into an explicit `rw`. rw [spanSingleton, ← coeToSubmodule_inj, coe_mk, span_singleton_generator]
import Mathlib.Analysis.Analytic.Basic import Mathlib.Analysis.Analytic.CPolynomial import Mathlib.Analysis.Calculus.Deriv.Basic import Mathlib.Analysis.Calculus.ContDiff.Defs import Mathlib.Analysis.Calculus.FDeriv.Add #align_import analysis.calculus.fderiv_analytic from "leanprover-community/mathlib"@"3bce8d800a6f2b8f63fe1e588fd76a9ff4adcebe" open Filter Asymptotics open scoped ENNReal universe u v variable {𝕜 : Type} [NontriviallyNormedField 𝕜] variable {E : Type u} [NormedAddCommGroup E] [NormedSpace 𝕜 E] variable {F : Type v} [NormedAddCommGroup F] [NormedSpace 𝕜 F] namespace ContinuousMultilinearMap variable {ι : Type} {E : ι → Type} [∀ i, NormedAddCommGroup (E i)] [∀ i, NormedSpace 𝕜 (E i)] [Fintype ι] (f : ContinuousMultilinearMap 𝕜 E F) open FormalMultilinearSeries protected theorem hasFiniteFPowerSeriesOnBall : HasFiniteFPowerSeriesOnBall f f.toFormalMultilinearSeries 0 (Fintype.card ι + 1) ⊤ := .mk' (fun m hm ↦ dif_neg (Nat.succ_le_iff.mp hm).ne) ENNReal.zero_lt_top fun y _ ↦ by rw [Finset.sum_eq_single_of_mem _ (Finset.self_mem_range_succ _), zero_add] · rw [toFormalMultilinearSeries, dif_pos rfl]; rfl · intro m _ ne; rw [toFormalMultilinearSeries, dif_neg ne.symm]; rfl theorem changeOriginSeries_support {k l : ℕ} (h : k + l ≠ Fintype.card ι) : f.toFormalMultilinearSeries.changeOriginSeries k l = 0 := Finset.sum_eq_zero fun _ _ ↦ by simp_rw [FormalMultilinearSeries.changeOriginSeriesTerm, toFormalMultilinearSeries, dif_neg h.symm, LinearIsometryEquiv.map_zero] variable {n : ℕ∞} (x : ∀ i, E i) open Finset in theorem changeOrigin_toFormalMultilinearSeries [DecidableEq ι] : continuousMultilinearCurryFin1 𝕜 (∀ i, E i) F (f.toFormalMultilinearSeries.changeOrigin x 1) = f.linearDeriv x := by ext y rw [continuousMultilinearCurryFin1_apply, linearDeriv_apply, changeOrigin, FormalMultilinearSeries.sum] cases isEmpty_or_nonempty ι · have (l) : 1 + l ≠ Fintype.card ι := by rw [add_comm, Fintype.card_eq_zero]; exact Nat.succ_ne_zero _ simp_rw [Fintype.sum_empty, changeOriginSeries_support _ (this _), zero_apply _, tsum_zero]; rfl rw [tsum_eq_single (Fintype.card ι - 1), changeOriginSeries]; swap · intro m hm rw [Ne, eq_tsub_iff_add_eq_of_le (by exact Fintype.card_pos), add_comm] at hm rw [f.changeOriginSeries_support hm, zero_apply] rw [sum_apply, ContinuousMultilinearMap.sum_apply, Fin.snoc_zero] simp_rw [changeOriginSeriesTerm_apply] refine (Fintype.sum_bijective (?_ ∘ Fintype.equivFinOfCardEq (Nat.add_sub_of_le Fintype.card_pos).symm) (.comp ?_ <\| Equiv.bijective _) _ _ fun i ↦ ?_).symm · exact (⟨{·}ᶜ, by rw [card_compl, Fintype.card_fin, card_singleton, Nat.add_sub_cancel_left]⟩) · use fun _ _ ↦ (singleton_injective <\| compl_injective <\| Subtype.ext_iff.mp ·) intro ⟨s, hs⟩ have h : sᶜ.card = 1 := by rw [card_compl, hs, Fintype.card_fin, Nat.add_sub_cancel] obtain ⟨a, ha⟩ := card_eq_one.mp h exact ⟨a, Subtype.ext (compl_eq_comm.mp ha)⟩ rw [Function.comp_apply, Subtype.coe_mk, compl_singleton, piecewise_erase_univ, toFormalMultilinearSeries, dif_pos (Nat.add_sub_of_le Fintype.card_pos).symm] simp_rw [domDomCongr_apply, compContinuousLinearMap_apply, ContinuousLinearMap.proj_apply, Function.update_apply, (Equiv.injective _).eq_iff, ite_apply] congr; ext j obtain rfl \| hj := eq_or_ne j i · rw [Function.update_same, if_pos rfl] · rw [Function.update_noteq hj, if_neg hj] protected theorem hasFDerivAt [DecidableEq ι] : HasFDerivAt f (f.linearDeriv x) x := by rw [← changeOrigin_toFormalMultilinearSeries] convert f.hasFiniteFPowerSeriesOnBall.hasFDerivAt (y := x) ENNReal.coe_lt_top rw [zero_add] private lemma _root_.Equiv.succ_embeddingFinSucc_fst_symm_apply {ι : Type} [DecidableEq ι] {n : ℕ} (e : Fin (n+1) ↪ ι) {k : ι} (h'k : k ∈ Set.range (Equiv.embeddingFinSucc n ι e).1) (hk : k ∈ Set.range e) : Fin.succ ((Equiv.embeddingFinSucc n ι e).1.toEquivRange.symm ⟨k, h'k⟩) = e.toEquivRange.symm ⟨k, hk⟩ := by rcases hk with ⟨j, rfl⟩ have hj : j ≠ 0 := by rintro rfl simp at h'k simp only [Function.Embedding.toEquivRange_symm_apply_self] have : e j = (Equiv.embeddingFinSucc n ι e).1 (Fin.pred j hj) := by simp simp_rw [this] simp [-Equiv.embeddingFinSucc_fst] theorem hasFTaylorSeriesUpTo_iteratedFDeriv : HasFTaylorSeriesUpTo ⊤ f (fun v n ↦ f.iteratedFDeriv n v) := by classical constructor · simp [ContinuousMultilinearMap.iteratedFDeriv] · rintro n - x suffices H : curryLeft (f.iteratedFDeriv (Nat.succ n) x) = (∑ e : Fin n ↪ ι, ((iteratedFDerivComponent f e.toEquivRange).linearDeriv (Pi.compRightL 𝕜 _ Subtype.val x)) ∘L (Pi.compRightL 𝕜 _ Subtype.val)) by have A : HasFDerivAt (f.iteratedFDeriv n) (∑ e : Fin n ↪ ι, ((iteratedFDerivComponent f e.toEquivRange).linearDeriv (Pi.compRightL 𝕜 _ Subtype.val x)) ∘L (Pi.compRightL 𝕜 _ Subtype.val)) x := by apply HasFDerivAt.sum (fun s _hs ↦ ?_) exact (ContinuousMultilinearMap.hasFDerivAt _ _).comp x (ContinuousLinearMap.hasFDerivAt _) rwa [← H] at A ext v m simp only [ContinuousMultilinearMap.iteratedFDeriv, curryLeft_apply, sum_apply, iteratedFDerivComponent_apply, Finset.univ_sigma_univ, Pi.compRightL_apply, ContinuousLinearMap.coe_sum', ContinuousLinearMap.coe_comp', Finset.sum_apply, Function.comp_apply, linearDeriv_apply, Finset.sum_sigma'] rw [← (Equiv.embeddingFinSucc n ι).sum_comp] congr with e congr with k by_cases hke : k ∈ Set.range e · simp only [hke, ↓reduceDite] split_ifs with hkf · simp only [← Equiv.succ_embeddingFinSucc_fst_symm_apply e hkf hke, Fin.cons_succ] · obtain rfl : k = e 0 := by rcases hke with ⟨j, rfl⟩ simpa using hkf simp only [Function.Embedding.toEquivRange_symm_apply_self, Fin.cons_zero, Function.update, Pi.compRightL_apply] split_ifs with h · congr! · exfalso apply h simp_rw [← Equiv.embeddingFinSucc_snd e] · have hkf : k ∉ Set.range (Equiv.embeddingFinSucc n ι e).1 := by contrapose! hke rw [Equiv.embeddingFinSucc_fst] at hke exact Set.range_comp_subset_range _ _ hke simp only [hke, hkf, ↓reduceDite, Pi.compRightL, ContinuousLinearMap.coe_mk', LinearMap.coe_mk, AddHom.coe_mk] rw [Function.update_noteq] contrapose! hke rw [show k = _ from Subtype.ext_iff_val.1 hke, Equiv.embeddingFinSucc_snd e] exact Set.mem_range_self _ · rintro n - apply continuous_finset_sum _ (fun e _ ↦ ?_) exact (ContinuousMultilinearMap.coe_continuous _).comp (ContinuousLinearMap.continuous _) theorem iteratedFDeriv_eq (n : ℕ) : iteratedFDeriv 𝕜 n f = f.iteratedFDeriv n := funext fun x ↦ (f.hasFTaylorSeriesUpTo_iteratedFDeriv.eq_iteratedFDeriv (m := n) le_top x).symm	Mathlib/Analysis/Calculus/FDeriv/Analytic.lean	426	430	theorem norm_iteratedFDeriv_le (n : ℕ) (x : (i : ι) → E i) : ‖iteratedFDeriv 𝕜 n f x‖ ≤ Nat.descFactorial (Fintype.card ι) n * ‖f‖ * ‖x‖ ^ (Fintype.card ι - n) := by	rw [f.iteratedFDeriv_eq] exact f.norm_iteratedFDeriv_le' n x
import Mathlib.Topology.Order.MonotoneContinuity import Mathlib.Topology.Algebra.Order.LiminfLimsup import Mathlib.Topology.Instances.NNReal import Mathlib.Topology.EMetricSpace.Lipschitz import Mathlib.Topology.Metrizable.Basic import Mathlib.Topology.Order.T5 #align_import topology.instances.ennreal from "leanprover-community/mathlib"@"ec4b2eeb50364487f80421c0b4c41328a611f30d" noncomputable section open Set Filter Metric Function open scoped Classical Topology ENNReal NNReal Filter variable {α : Type} {β : Type} {γ : Type} namespace ENNReal variable {a b c d : ℝ≥0∞} {r p q : ℝ≥0} {x y z : ℝ≥0∞} {ε ε₁ ε₂ : ℝ≥0∞} {s : Set ℝ≥0∞} namespace NNReal theorem tsum_eq_toNNReal_tsum {f : β → ℝ≥0} : ∑' b, f b = (∑' b, (f b : ℝ≥0∞)).toNNReal := by by_cases h : Summable f · rw [← ENNReal.coe_tsum h, ENNReal.toNNReal_coe] · have A := tsum_eq_zero_of_not_summable h simp only [← ENNReal.tsum_coe_ne_top_iff_summable, Classical.not_not] at h simp only [h, ENNReal.top_toNNReal, A] #align nnreal.tsum_eq_to_nnreal_tsum NNReal.tsum_eq_toNNReal_tsum theorem exists_le_hasSum_of_le {f g : β → ℝ≥0} {r : ℝ≥0} (hgf : ∀ b, g b ≤ f b) (hfr : HasSum f r) : ∃ p ≤ r, HasSum g p := have : (∑' b, (g b : ℝ≥0∞)) ≤ r := by refine hasSum_le (fun b => ?_) ENNReal.summable.hasSum (ENNReal.hasSum_coe.2 hfr) exact ENNReal.coe_le_coe.2 (hgf _) let ⟨p, Eq, hpr⟩ := ENNReal.le_coe_iff.1 this ⟨p, hpr, ENNReal.hasSum_coe.1 <\| Eq ▸ ENNReal.summable.hasSum⟩ #align nnreal.exists_le_has_sum_of_le NNReal.exists_le_hasSum_of_le theorem summable_of_le {f g : β → ℝ≥0} (hgf : ∀ b, g b ≤ f b) : Summable f → Summable g \| ⟨_r, hfr⟩ => let ⟨_p, _, hp⟩ := exists_le_hasSum_of_le hgf hfr hp.summable #align nnreal.summable_of_le NNReal.summable_of_le theorem _root_.Summable.countable_support_nnreal (f : α → ℝ≥0) (h : Summable f) : f.support.Countable := by rw [← NNReal.summable_coe] at h simpa [support] using h.countable_support theorem hasSum_iff_tendsto_nat {f : ℕ → ℝ≥0} {r : ℝ≥0} : HasSum f r ↔ Tendsto (fun n : ℕ => ∑ i ∈ Finset.range n, f i) atTop (𝓝 r) := by rw [← ENNReal.hasSum_coe, ENNReal.hasSum_iff_tendsto_nat] simp only [← ENNReal.coe_finset_sum] exact ENNReal.tendsto_coe #align nnreal.has_sum_iff_tendsto_nat NNReal.hasSum_iff_tendsto_nat theorem not_summable_iff_tendsto_nat_atTop {f : ℕ → ℝ≥0} : ¬Summable f ↔ Tendsto (fun n : ℕ => ∑ i ∈ Finset.range n, f i) atTop atTop := by constructor · intro h refine ((tendsto_of_monotone ?_).resolve_right h).comp ?_ exacts [Finset.sum_mono_set _, tendsto_finset_range] · rintro hnat ⟨r, hr⟩ exact not_tendsto_nhds_of_tendsto_atTop hnat _ (hasSum_iff_tendsto_nat.1 hr) #align nnreal.not_summable_iff_tendsto_nat_at_top NNReal.not_summable_iff_tendsto_nat_atTop theorem summable_iff_not_tendsto_nat_atTop {f : ℕ → ℝ≥0} : Summable f ↔ ¬Tendsto (fun n : ℕ => ∑ i ∈ Finset.range n, f i) atTop atTop := by rw [← not_iff_not, Classical.not_not, not_summable_iff_tendsto_nat_atTop] #align nnreal.summable_iff_not_tendsto_nat_at_top NNReal.summable_iff_not_tendsto_nat_atTop theorem summable_of_sum_range_le {f : ℕ → ℝ≥0} {c : ℝ≥0} (h : ∀ n, ∑ i ∈ Finset.range n, f i ≤ c) : Summable f := by refine summable_iff_not_tendsto_nat_atTop.2 fun H => ?_ rcases exists_lt_of_tendsto_atTop H 0 c with ⟨n, -, hn⟩ exact lt_irrefl _ (hn.trans_le (h n)) #align nnreal.summable_of_sum_range_le NNReal.summable_of_sum_range_le theorem tsum_le_of_sum_range_le {f : ℕ → ℝ≥0} {c : ℝ≥0} (h : ∀ n, ∑ i ∈ Finset.range n, f i ≤ c) : ∑' n, f n ≤ c := _root_.tsum_le_of_sum_range_le (summable_of_sum_range_le h) h #align nnreal.tsum_le_of_sum_range_le NNReal.tsum_le_of_sum_range_le theorem tsum_comp_le_tsum_of_inj {β : Type} {f : α → ℝ≥0} (hf : Summable f) {i : β → α} (hi : Function.Injective i) : (∑' x, f (i x)) ≤ ∑' x, f x := tsum_le_tsum_of_inj i hi (fun _ _ => zero_le _) (fun _ => le_rfl) (summable_comp_injective hf hi) hf #align nnreal.tsum_comp_le_tsum_of_inj NNReal.tsum_comp_le_tsum_of_inj theorem summable_sigma {β : α → Type*} {f : (Σ x, β x) → ℝ≥0} : Summable f ↔ (∀ x, Summable fun y => f ⟨x, y⟩) ∧ Summable fun x => ∑' y, f ⟨x, y⟩ := by constructor · simp only [← NNReal.summable_coe, NNReal.coe_tsum] exact fun h => ⟨h.sigma_factor, h.sigma⟩ · rintro ⟨h₁, h₂⟩ simpa only [← ENNReal.tsum_coe_ne_top_iff_summable, ENNReal.tsum_sigma', ENNReal.coe_tsum (h₁ _)] using h₂ #align nnreal.summable_sigma NNReal.summable_sigma theorem indicator_summable {f : α → ℝ≥0} (hf : Summable f) (s : Set α) : Summable (s.indicator f) := by refine NNReal.summable_of_le (fun a => le_trans (le_of_eq (s.indicator_apply f a)) ?_) hf split_ifs · exact le_refl (f a) · exact zero_le_coe #align nnreal.indicator_summable NNReal.indicator_summable theorem tsum_indicator_ne_zero {f : α → ℝ≥0} (hf : Summable f) {s : Set α} (h : ∃ a ∈ s, f a ≠ 0) : (∑' x, (s.indicator f) x) ≠ 0 := fun h' => let ⟨a, ha, hap⟩ := h hap ((Set.indicator_apply_eq_self.mpr (absurd ha)).symm.trans ((tsum_eq_zero_iff (indicator_summable hf s)).1 h' a)) #align nnreal.tsum_indicator_ne_zero NNReal.tsum_indicator_ne_zero open Finset theorem tendsto_sum_nat_add (f : ℕ → ℝ≥0) : Tendsto (fun i => ∑' k, f (k + i)) atTop (𝓝 0) := by rw [← tendsto_coe] convert _root_.tendsto_sum_nat_add fun i => (f i : ℝ) norm_cast #align nnreal.tendsto_sum_nat_add NNReal.tendsto_sum_nat_add nonrec theorem hasSum_lt {f g : α → ℝ≥0} {sf sg : ℝ≥0} {i : α} (h : ∀ a : α, f a ≤ g a) (hi : f i < g i) (hf : HasSum f sf) (hg : HasSum g sg) : sf < sg := by have A : ∀ a : α, (f a : ℝ) ≤ g a := fun a => NNReal.coe_le_coe.2 (h a) have : (sf : ℝ) < sg := hasSum_lt A (NNReal.coe_lt_coe.2 hi) (hasSum_coe.2 hf) (hasSum_coe.2 hg) exact NNReal.coe_lt_coe.1 this #align nnreal.has_sum_lt NNReal.hasSum_lt @[mono] theorem hasSum_strict_mono {f g : α → ℝ≥0} {sf sg : ℝ≥0} (hf : HasSum f sf) (hg : HasSum g sg) (h : f < g) : sf < sg := let ⟨hle, _i, hi⟩ := Pi.lt_def.mp h hasSum_lt hle hi hf hg #align nnreal.has_sum_strict_mono NNReal.hasSum_strict_mono theorem tsum_lt_tsum {f g : α → ℝ≥0} {i : α} (h : ∀ a : α, f a ≤ g a) (hi : f i < g i) (hg : Summable g) : ∑' n, f n < ∑' n, g n := hasSum_lt h hi (summable_of_le h hg).hasSum hg.hasSum #align nnreal.tsum_lt_tsum NNReal.tsum_lt_tsum @[mono] theorem tsum_strict_mono {f g : α → ℝ≥0} (hg : Summable g) (h : f < g) : ∑' n, f n < ∑' n, g n := let ⟨hle, _i, hi⟩ := Pi.lt_def.mp h tsum_lt_tsum hle hi hg #align nnreal.tsum_strict_mono NNReal.tsum_strict_mono theorem tsum_pos {g : α → ℝ≥0} (hg : Summable g) (i : α) (hi : 0 < g i) : 0 < ∑' b, g b := by rw [← tsum_zero] exact tsum_lt_tsum (fun a => zero_le _) hi hg #align nnreal.tsum_pos NNReal.tsum_pos	Mathlib/Topology/Instances/ENNReal.lean	1,266	1,270	theorem tsum_eq_add_tsum_ite {f : α → ℝ≥0} (hf : Summable f) (i : α) : ∑' x, f x = f i + ∑' x, ite (x = i) 0 (f x) := by	refine tsum_eq_add_tsum_ite' i (NNReal.summable_of_le (fun i' => ?_) hf) rw [Function.update_apply] split_ifs <;> simp only [zero_le', le_rfl]
import Mathlib.CategoryTheory.Limits.Shapes.Pullbacks import Mathlib.CategoryTheory.Limits.Preserves.Basic #align_import category_theory.limits.preserves.shapes.pullbacks from "leanprover-community/mathlib"@"f11e306adb9f2a393539d2bb4293bf1b42caa7ac" noncomputable section universe v₁ v₂ u₁ u₂ -- Porting note: need Functor namespace for mapCone open CategoryTheory CategoryTheory.Category CategoryTheory.Limits CategoryTheory.Functor namespace CategoryTheory.Limits section Pushout variable {C : Type u₁} [Category.{v₁} C] variable {D : Type u₂} [Category.{v₂} D] variable (G : C ⥤ D) variable {W X Y Z : C} {h : X ⟶ Z} {k : Y ⟶ Z} {f : W ⟶ X} {g : W ⟶ Y} (comm : f ≫ h = g ≫ k) def isColimitMapCoconePushoutCoconeEquiv : IsColimit (mapCocone G (PushoutCocone.mk h k comm)) ≃ IsColimit (PushoutCocone.mk (G.map h) (G.map k) (by simp only [← G.map_comp, comm]) : PushoutCocone (G.map f) (G.map g)) := (IsColimit.precomposeHomEquiv (diagramIsoSpan.{v₂} _).symm _).symm.trans <\| IsColimit.equivIsoColimit <\| Cocones.ext (Iso.refl _) <\| by rintro (_ \| _ \| _) <;> dsimp <;> simp only [Category.comp_id, Category.id_comp, ← G.map_comp] #align category_theory.limits.is_colimit_map_cocone_pushout_cocone_equiv CategoryTheory.Limits.isColimitMapCoconePushoutCoconeEquiv def isColimitPushoutCoconeMapOfIsColimit [PreservesColimit (span f g) G] (l : IsColimit (PushoutCocone.mk h k comm)) : IsColimit (PushoutCocone.mk (G.map h) (G.map k) (show G.map f ≫ G.map h = G.map g ≫ G.map k from by simp only [← G.map_comp,comm] )) := isColimitMapCoconePushoutCoconeEquiv G comm (PreservesColimit.preserves l) #align category_theory.limits.is_colimit_pushout_cocone_map_of_is_colimit CategoryTheory.Limits.isColimitPushoutCoconeMapOfIsColimit def isColimitOfIsColimitPushoutCoconeMap [ReflectsColimit (span f g) G] (l : IsColimit (PushoutCocone.mk (G.map h) (G.map k) (show G.map f ≫ G.map h = G.map g ≫ G.map k from by simp only [← G.map_comp,comm]))) : IsColimit (PushoutCocone.mk h k comm) := ReflectsColimit.reflects ((isColimitMapCoconePushoutCoconeEquiv G comm).symm l) #align category_theory.limits.is_colimit_of_is_colimit_pushout_cocone_map CategoryTheory.Limits.isColimitOfIsColimitPushoutCoconeMap variable (f g) [PreservesColimit (span f g) G] def isColimitOfHasPushoutOfPreservesColimit [i : HasPushout f g] : IsColimit (PushoutCocone.mk (G.map pushout.inl) (G.map (@pushout.inr _ _ _ _ _ f g i)) (show G.map f ≫ G.map pushout.inl = G.map g ≫ G.map pushout.inr from by simp only [← G.map_comp, pushout.condition])) := isColimitPushoutCoconeMapOfIsColimit G _ (pushoutIsPushout f g) #align category_theory.limits.is_colimit_of_has_pushout_of_preserves_colimit CategoryTheory.Limits.isColimitOfHasPushoutOfPreservesColimit def preservesPushoutSymmetry : PreservesColimit (span g f) G where preserves {c} hc := by apply (IsColimit.precomposeHomEquiv (diagramIsoSpan.{v₂} _).symm _).toFun apply IsColimit.ofIsoColimit _ (PushoutCocone.isoMk _).symm apply PushoutCocone.isColimitOfFlip apply (isColimitMapCoconePushoutCoconeEquiv _ _).toFun · refine @PreservesColimit.preserves _ _ _ _ _ _ _ _ ?_ _ ?_ -- Porting note: more TC coddling · dsimp infer_instance · exact PushoutCocone.flipIsColimit hc #align category_theory.limits.preserves_pushout_symmetry CategoryTheory.Limits.preservesPushoutSymmetry theorem hasPushout_of_preservesPushout [HasPushout f g] : HasPushout (G.map f) (G.map g) := ⟨⟨⟨_, isColimitPushoutCoconeMapOfIsColimit G _ (pushoutIsPushout _ _)⟩⟩⟩ #align category_theory.limits.has_pushout_of_preserves_pushout CategoryTheory.Limits.hasPushout_of_preservesPushout variable [HasPushout f g] [HasPushout (G.map f) (G.map g)] def PreservesPushout.iso : pushout (G.map f) (G.map g) ≅ G.obj (pushout f g) := IsColimit.coconePointUniqueUpToIso (colimit.isColimit _) (isColimitOfHasPushoutOfPreservesColimit G f g) #align category_theory.limits.preserves_pushout.iso CategoryTheory.Limits.PreservesPushout.iso @[simp] theorem PreservesPushout.iso_hom : (PreservesPushout.iso G f g).hom = pushoutComparison G f g := rfl #align category_theory.limits.preserves_pushout.iso_hom CategoryTheory.Limits.PreservesPushout.iso_hom @[reassoc]	Mathlib/CategoryTheory/Limits/Preserves/Shapes/Pullbacks.lean	225	228	theorem PreservesPushout.inl_iso_hom : pushout.inl ≫ (PreservesPushout.iso G f g).hom = G.map pushout.inl := by	delta PreservesPushout.iso simp
import Mathlib.Algebra.Bounds import Mathlib.Algebra.Order.Field.Basic -- Porting note: `LinearOrderedField`, etc import Mathlib.Data.Set.Pointwise.SMul #align_import algebra.order.pointwise from "leanprover-community/mathlib"@"9003f28797c0664a49e4179487267c494477d853" open Function Set open Pointwise variable {α : Type} -- Porting note: Swapped the place of `CompleteLattice` and `ConditionallyCompleteLattice` -- due to simpNF problem between `sSup_xx` `csSup_xx`. section CompleteLattice variable [CompleteLattice α] section Group variable [Group α] [CovariantClass α α (· ·) (· ≤ ·)] [CovariantClass α α (swap (· * ·)) (· ≤ ·)] {s t : Set α} @[to_additive] theorem csSup_inv (hs₀ : s.Nonempty) (hs₁ : BddBelow s) : sSup s⁻¹ = (sInf s)⁻¹ := by rw [← image_inv] exact ((OrderIso.inv α).map_csInf' hs₀ hs₁).symm #align cSup_inv csSup_inv #align cSup_neg csSup_neg @[to_additive] theorem csInf_inv (hs₀ : s.Nonempty) (hs₁ : BddAbove s) : sInf s⁻¹ = (sSup s)⁻¹ := by rw [← image_inv] exact ((OrderIso.inv α).map_csSup' hs₀ hs₁).symm #align cInf_inv csInf_inv #align cInf_neg csInf_neg @[to_additive] theorem csSup_mul (hs₀ : s.Nonempty) (hs₁ : BddAbove s) (ht₀ : t.Nonempty) (ht₁ : BddAbove t) : sSup (s * t) = sSup s * sSup t := csSup_image2_eq_csSup_csSup (fun _ => (OrderIso.mulRight _).to_galoisConnection) (fun _ => (OrderIso.mulLeft _).to_galoisConnection) hs₀ hs₁ ht₀ ht₁ #align cSup_mul csSup_mul #align cSup_add csSup_add @[to_additive] theorem csInf_mul (hs₀ : s.Nonempty) (hs₁ : BddBelow s) (ht₀ : t.Nonempty) (ht₁ : BddBelow t) : sInf (s * t) = sInf s * sInf t := csInf_image2_eq_csInf_csInf (fun _ => (OrderIso.mulRight _).symm.to_galoisConnection) (fun _ => (OrderIso.mulLeft _).symm.to_galoisConnection) hs₀ hs₁ ht₀ ht₁ #align cInf_mul csInf_mul #align cInf_add csInf_add @[to_additive]	Mathlib/Algebra/Order/Pointwise.lean	160	162	theorem csSup_div (hs₀ : s.Nonempty) (hs₁ : BddAbove s) (ht₀ : t.Nonempty) (ht₁ : BddBelow t) : sSup (s / t) = sSup s / sInf t := by	rw [div_eq_mul_inv, csSup_mul hs₀ hs₁ ht₀.inv ht₁.inv, csSup_inv ht₀ ht₁, div_eq_mul_inv]
import Mathlib.NumberTheory.Padics.PadicNumbers import Mathlib.RingTheory.DiscreteValuationRing.Basic #align_import number_theory.padics.padic_integers from "leanprover-community/mathlib"@"f0c8bf9245297a541f468be517f1bde6195105e9" open Padic Metric LocalRing noncomputable section open scoped Classical def PadicInt (p : ℕ) [Fact p.Prime] := { x : ℚ_[p] // ‖x‖ ≤ 1 } #align padic_int PadicInt notation "ℤ_[" p "]" => PadicInt p namespace PadicInt variable {p : ℕ} [Fact p.Prime] theorem norm_le_one (z : ℤ_[p]) : ‖z‖ ≤ 1 := z.2 #align padic_int.norm_le_one PadicInt.norm_le_one @[simp] theorem norm_mul (z1 z2 : ℤ_[p]) : ‖z1 * z2‖ = ‖z1‖ * ‖z2‖ := by simp [norm_def] #align padic_int.norm_mul PadicInt.norm_mul @[simp] theorem norm_pow (z : ℤ_[p]) : ∀ n : ℕ, ‖z ^ n‖ = ‖z‖ ^ n \| 0 => by simp \| k + 1 => by rw [pow_succ, pow_succ, norm_mul] congr apply norm_pow #align padic_int.norm_pow PadicInt.norm_pow theorem nonarchimedean (q r : ℤ_[p]) : ‖q + r‖ ≤ max ‖q‖ ‖r‖ := padicNormE.nonarchimedean _ _ #align padic_int.nonarchimedean PadicInt.nonarchimedean theorem norm_add_eq_max_of_ne {q r : ℤ_[p]} : ‖q‖ ≠ ‖r‖ → ‖q + r‖ = max ‖q‖ ‖r‖ := padicNormE.add_eq_max_of_ne #align padic_int.norm_add_eq_max_of_ne PadicInt.norm_add_eq_max_of_ne theorem norm_eq_of_norm_add_lt_right {z1 z2 : ℤ_[p]} (h : ‖z1 + z2‖ < ‖z2‖) : ‖z1‖ = ‖z2‖ := by_contra fun hne => not_lt_of_ge (by rw [norm_add_eq_max_of_ne hne]; apply le_max_right) h #align padic_int.norm_eq_of_norm_add_lt_right PadicInt.norm_eq_of_norm_add_lt_right theorem norm_eq_of_norm_add_lt_left {z1 z2 : ℤ_[p]} (h : ‖z1 + z2‖ < ‖z1‖) : ‖z1‖ = ‖z2‖ := by_contra fun hne => not_lt_of_ge (by rw [norm_add_eq_max_of_ne hne]; apply le_max_left) h #align padic_int.norm_eq_of_norm_add_lt_left PadicInt.norm_eq_of_norm_add_lt_left @[simp]	Mathlib/NumberTheory/Padics/PadicIntegers.lean	303	303	theorem padic_norm_e_of_padicInt (z : ℤ_[p]) : ‖(z : ℚ_[p])‖ = ‖z‖ := by	simp [norm_def]
import Mathlib.Algebra.CharZero.Lemmas import Mathlib.Algebra.Order.Interval.Set.Group import Mathlib.Algebra.Group.Int import Mathlib.Data.Int.Lemmas import Mathlib.Data.Set.Subsingleton import Mathlib.Init.Data.Nat.Lemmas import Mathlib.Order.GaloisConnection import Mathlib.Tactic.Abel import Mathlib.Tactic.Linarith import Mathlib.Tactic.Positivity #align_import algebra.order.floor from "leanprover-community/mathlib"@"afdb43429311b885a7988ea15d0bac2aac80f69c" open Set variable {F α β : Type*} class FloorSemiring (α) [OrderedSemiring α] where floor : α → ℕ ceil : α → ℕ floor_of_neg {a : α} (ha : a < 0) : floor a = 0 gc_floor {a : α} {n : ℕ} (ha : 0 ≤ a) : n ≤ floor a ↔ (n : α) ≤ a gc_ceil : GaloisConnection ceil (↑) #align floor_semiring FloorSemiring instance : FloorSemiring ℕ where floor := id ceil := id floor_of_neg ha := (Nat.not_lt_zero _ ha).elim gc_floor _ := by rw [Nat.cast_id] rfl gc_ceil n a := by rw [Nat.cast_id] rfl namespace Nat section LinearOrderedSemiring variable [LinearOrderedSemiring α] [FloorSemiring α] {a : α} {n : ℕ} theorem le_floor_iff (ha : 0 ≤ a) : n ≤ ⌊a⌋₊ ↔ (n : α) ≤ a := FloorSemiring.gc_floor ha #align nat.le_floor_iff Nat.le_floor_iff theorem le_floor (h : (n : α) ≤ a) : n ≤ ⌊a⌋₊ := (le_floor_iff <\| n.cast_nonneg.trans h).2 h #align nat.le_floor Nat.le_floor theorem floor_lt (ha : 0 ≤ a) : ⌊a⌋₊ < n ↔ a < n := lt_iff_lt_of_le_iff_le <\| le_floor_iff ha #align nat.floor_lt Nat.floor_lt theorem floor_lt_one (ha : 0 ≤ a) : ⌊a⌋₊ < 1 ↔ a < 1 := (floor_lt ha).trans <\| by rw [Nat.cast_one] #align nat.floor_lt_one Nat.floor_lt_one theorem lt_of_floor_lt (h : ⌊a⌋₊ < n) : a < n := lt_of_not_le fun h' => (le_floor h').not_lt h #align nat.lt_of_floor_lt Nat.lt_of_floor_lt theorem lt_one_of_floor_lt_one (h : ⌊a⌋₊ < 1) : a < 1 := mod_cast lt_of_floor_lt h #align nat.lt_one_of_floor_lt_one Nat.lt_one_of_floor_lt_one theorem floor_le (ha : 0 ≤ a) : (⌊a⌋₊ : α) ≤ a := (le_floor_iff ha).1 le_rfl #align nat.floor_le Nat.floor_le theorem lt_succ_floor (a : α) : a < ⌊a⌋₊.succ := lt_of_floor_lt <\| Nat.lt_succ_self _ #align nat.lt_succ_floor Nat.lt_succ_floor theorem lt_floor_add_one (a : α) : a < ⌊a⌋₊ + 1 := by simpa using lt_succ_floor a #align nat.lt_floor_add_one Nat.lt_floor_add_one @[simp] theorem floor_natCast (n : ℕ) : ⌊(n : α)⌋₊ = n := eq_of_forall_le_iff fun a => by rw [le_floor_iff, Nat.cast_le] exact n.cast_nonneg #align nat.floor_coe Nat.floor_natCast @[deprecated (since := "2024-06-08")] alias floor_coe := floor_natCast @[simp] theorem floor_zero : ⌊(0 : α)⌋₊ = 0 := by rw [← Nat.cast_zero, floor_natCast] #align nat.floor_zero Nat.floor_zero @[simp] theorem floor_one : ⌊(1 : α)⌋₊ = 1 := by rw [← Nat.cast_one, floor_natCast] #align nat.floor_one Nat.floor_one -- See note [no_index around OfNat.ofNat] @[simp] theorem floor_ofNat (n : ℕ) [n.AtLeastTwo] : ⌊no_index (OfNat.ofNat n : α)⌋₊ = n := Nat.floor_natCast _ theorem floor_of_nonpos (ha : a ≤ 0) : ⌊a⌋₊ = 0 := ha.lt_or_eq.elim FloorSemiring.floor_of_neg <\| by rintro rfl exact floor_zero #align nat.floor_of_nonpos Nat.floor_of_nonpos theorem floor_mono : Monotone (floor : α → ℕ) := fun a b h => by obtain ha \| ha := le_total a 0 · rw [floor_of_nonpos ha] exact Nat.zero_le _ · exact le_floor ((floor_le ha).trans h) #align nat.floor_mono Nat.floor_mono @[gcongr] theorem floor_le_floor : ∀ x y : α, x ≤ y → ⌊x⌋₊ ≤ ⌊y⌋₊ := floor_mono theorem le_floor_iff' (hn : n ≠ 0) : n ≤ ⌊a⌋₊ ↔ (n : α) ≤ a := by obtain ha \| ha := le_total a 0 · rw [floor_of_nonpos ha] exact iff_of_false (Nat.pos_of_ne_zero hn).not_le (not_le_of_lt <\| ha.trans_lt <\| cast_pos.2 <\| Nat.pos_of_ne_zero hn) · exact le_floor_iff ha #align nat.le_floor_iff' Nat.le_floor_iff' @[simp] theorem one_le_floor_iff (x : α) : 1 ≤ ⌊x⌋₊ ↔ 1 ≤ x := mod_cast @le_floor_iff' α _ _ x 1 one_ne_zero #align nat.one_le_floor_iff Nat.one_le_floor_iff theorem floor_lt' (hn : n ≠ 0) : ⌊a⌋₊ < n ↔ a < n := lt_iff_lt_of_le_iff_le <\| le_floor_iff' hn #align nat.floor_lt' Nat.floor_lt'	Mathlib/Algebra/Order/Floor.lean	221	223	theorem floor_pos : 0 < ⌊a⌋₊ ↔ 1 ≤ a := by	-- Porting note: broken `convert le_floor_iff' Nat.one_ne_zero` rw [Nat.lt_iff_add_one_le, zero_add, le_floor_iff' Nat.one_ne_zero, cast_one]
import Mathlib.Algebra.Group.Submonoid.Membership import Mathlib.Algebra.Group.Units import Mathlib.Algebra.Regular.Basic import Mathlib.GroupTheory.Congruence.Basic import Mathlib.Init.Data.Prod import Mathlib.RingTheory.OreLocalization.Basic #align_import group_theory.monoid_localization from "leanprover-community/mathlib"@"10ee941346c27bdb5e87bb3535100c0b1f08ac41" open Function section CommMonoid variable {M : Type} [CommMonoid M] (S : Submonoid M) (N : Type) [CommMonoid N] {P : Type} [CommMonoid P] @[to_additive AddLocalization "The localization of an `AddCommMonoid` at one of its submonoids (as a quotient type)."] def Localization := (Localization.r S).Quotient #align localization Localization #align add_localization AddLocalization namespace Localization @[to_additive] instance inhabited : Inhabited (Localization S) := Con.Quotient.inhabited #align localization.inhabited Localization.inhabited #align add_localization.inhabited AddLocalization.inhabited @[to_additive "Addition in an `AddLocalization` is defined as `⟨a, b⟩ + ⟨c, d⟩ = ⟨a + c, b + d⟩`. Should not be confused with the ring localization counterpart `Localization.add`, which maps `⟨a, b⟩ + ⟨c, d⟩` to `⟨d a + b * c, b * d⟩`."] protected irreducible_def mul : Localization S → Localization S → Localization S := (r S).commMonoid.mul #align localization.mul Localization.mul #align add_localization.add AddLocalization.add @[to_additive] instance : Mul (Localization S) := ⟨Localization.mul S⟩ @[to_additive "The identity element of an `AddLocalization` is defined as `⟨0, 0⟩`. Should not be confused with the ring localization counterpart `Localization.zero`, which is defined as `⟨0, 1⟩`."] protected irreducible_def one : Localization S := (r S).commMonoid.one #align localization.one Localization.one #align add_localization.zero AddLocalization.zero @[to_additive] instance : One (Localization S) := ⟨Localization.one S⟩ @[to_additive "Multiplication with a natural in an `AddLocalization` is defined as `n • ⟨a, b⟩ = ⟨n • a, n • b⟩`. This is a separate `irreducible` def to ensure the elaborator doesn't waste its time trying to unify some huge recursive definition with itself, but unfolded one step less."] protected irreducible_def npow : ℕ → Localization S → Localization S := (r S).commMonoid.npow #align localization.npow Localization.npow #align add_localization.nsmul AddLocalization.nsmul @[to_additive] instance commMonoid : CommMonoid (Localization S) where mul := (· * ·) one := 1 mul_assoc x y z := show (x.mul S y).mul S z = x.mul S (y.mul S z) by rw [Localization.mul]; apply (r S).commMonoid.mul_assoc mul_comm x y := show x.mul S y = y.mul S x by rw [Localization.mul]; apply (r S).commMonoid.mul_comm mul_one x := show x.mul S (.one S) = x by rw [Localization.mul, Localization.one]; apply (r S).commMonoid.mul_one one_mul x := show (Localization.one S).mul S x = x by rw [Localization.mul, Localization.one]; apply (r S).commMonoid.one_mul npow := Localization.npow S npow_zero x := show Localization.npow S 0 x = .one S by rw [Localization.npow, Localization.one]; apply (r S).commMonoid.npow_zero npow_succ n x := show Localization.npow S n.succ x = (Localization.npow S n x).mul S x by rw [Localization.npow, Localization.mul]; apply (r S).commMonoid.npow_succ variable {S} @[to_additive "Given an `AddCommMonoid` `M` and submonoid `S`, `mk` sends `x : M`, `y ∈ S` to the equivalence class of `(x, y)` in the localization of `M` at `S`."] def mk (x : M) (y : S) : Localization S := (r S).mk' (x, y) #align localization.mk Localization.mk #align add_localization.mk AddLocalization.mk @[to_additive] theorem mk_eq_mk_iff {a c : M} {b d : S} : mk a b = mk c d ↔ r S ⟨a, b⟩ ⟨c, d⟩ := (r S).eq #align localization.mk_eq_mk_iff Localization.mk_eq_mk_iff #align add_localization.mk_eq_mk_iff AddLocalization.mk_eq_mk_iff universe u @[to_additive (attr := elab_as_elim) "Dependent recursion principle for `AddLocalizations`: given elements `f a b : p (mk a b)` for all `a b`, such that `r S (a, b) (c, d)` implies `f a b = f c d` (with the correct coercions), then `f` is defined on the whole `AddLocalization S`."] def rec {p : Localization S → Sort u} (f : ∀ (a : M) (b : S), p (mk a b)) (H : ∀ {a c : M} {b d : S} (h : r S (a, b) (c, d)), (Eq.ndrec (f a b) (mk_eq_mk_iff.mpr h) : p (mk c d)) = f c d) (x) : p x := Quot.rec (fun y ↦ Eq.ndrec (f y.1 y.2) (by rfl)) (fun y z h ↦ by cases y; cases z; exact H h) x #align localization.rec Localization.rec #align add_localization.rec AddLocalization.rec @[to_additive (attr := elab_as_elim) "Copy of `Quotient.recOnSubsingleton₂` for `AddLocalization`"] def recOnSubsingleton₂ {r : Localization S → Localization S → Sort u} [h : ∀ (a c : M) (b d : S), Subsingleton (r (mk a b) (mk c d))] (x y : Localization S) (f : ∀ (a c : M) (b d : S), r (mk a b) (mk c d)) : r x y := @Quotient.recOnSubsingleton₂' _ _ _ _ r (Prod.rec fun _ _ => Prod.rec fun _ _ => h _ _ _ _) x y (Prod.rec fun _ _ => Prod.rec fun _ _ => f _ _ _ _) #align localization.rec_on_subsingleton₂ Localization.recOnSubsingleton₂ #align add_localization.rec_on_subsingleton₂ AddLocalization.recOnSubsingleton₂ @[to_additive] theorem mk_mul (a c : M) (b d : S) : mk a b * mk c d = mk (a * c) (b * d) := show Localization.mul S _ _ = _ by rw [Localization.mul]; rfl #align localization.mk_mul Localization.mk_mul #align add_localization.mk_add AddLocalization.mk_add @[to_additive] theorem mk_one : mk 1 (1 : S) = 1 := show mk _ _ = .one S by rw [Localization.one]; rfl #align localization.mk_one Localization.mk_one #align add_localization.mk_zero AddLocalization.mk_zero @[to_additive] theorem mk_pow (n : ℕ) (a : M) (b : S) : mk a b ^ n = mk (a ^ n) (b ^ n) := show Localization.npow S _ _ = _ by rw [Localization.npow]; rfl #align localization.mk_pow Localization.mk_pow #align add_localization.mk_nsmul AddLocalization.mk_nsmul -- Porting note: mathport translated `rec` to `ndrec` in the name of this lemma @[to_additive (attr := simp)] theorem ndrec_mk {p : Localization S → Sort u} (f : ∀ (a : M) (b : S), p (mk a b)) (H) (a : M) (b : S) : (rec f H (mk a b) : p (mk a b)) = f a b := rfl #align localization.rec_mk Localization.ndrec_mk #align add_localization.rec_mk AddLocalization.ndrec_mk -- Porting note: the attribute `elab_as_elim` fails with `unexpected eliminator resulting type p` -- @[to_additive (attr := elab_as_elim) @[to_additive "Non-dependent recursion principle for `AddLocalization`s: given elements `f a b : p` for all `a b`, such that `r S (a, b) (c, d)` implies `f a b = f c d`, then `f` is defined on the whole `Localization S`."] def liftOn {p : Sort u} (x : Localization S) (f : M → S → p) (H : ∀ {a c : M} {b d : S}, r S (a, b) (c, d) → f a b = f c d) : p := rec f (fun h ↦ (by simpa only [eq_rec_constant] using H h)) x #align localization.lift_on Localization.liftOn #align add_localization.lift_on AddLocalization.liftOn @[to_additive] theorem liftOn_mk {p : Sort u} (f : M → S → p) (H) (a : M) (b : S) : liftOn (mk a b) f H = f a b := rfl #align localization.lift_on_mk Localization.liftOn_mk #align add_localization.lift_on_mk AddLocalization.liftOn_mk @[to_additive (attr := elab_as_elim)] theorem ind {p : Localization S → Prop} (H : ∀ y : M × S, p (mk y.1 y.2)) (x) : p x := rec (fun a b ↦ H (a, b)) (fun _ ↦ rfl) x #align localization.ind Localization.ind #align add_localization.ind AddLocalization.ind @[to_additive (attr := elab_as_elim)] theorem induction_on {p : Localization S → Prop} (x) (H : ∀ y : M × S, p (mk y.1 y.2)) : p x := ind H x #align localization.induction_on Localization.induction_on #align add_localization.induction_on AddLocalization.induction_on -- Porting note: the attribute `elab_as_elim` fails with `unexpected eliminator resulting type p` -- @[to_additive (attr := elab_as_elim) @[to_additive "Non-dependent recursion principle for localizations: given elements `f x y : p` for all `x` and `y`, such that `r S x x'` and `r S y y'` implies `f x y = f x' y'`, then `f` is defined on the whole `Localization S`."] def liftOn₂ {p : Sort u} (x y : Localization S) (f : M → S → M → S → p) (H : ∀ {a a' b b' c c' d d'}, r S (a, b) (a', b') → r S (c, d) (c', d') → f a b c d = f a' b' c' d') : p := liftOn x (fun a b ↦ liftOn y (f a b) fun hy ↦ H ((r S).refl _) hy) fun hx ↦ induction_on y fun ⟨_, _⟩ ↦ H hx ((r S).refl _) #align localization.lift_on₂ Localization.liftOn₂ #align add_localization.lift_on₂ AddLocalization.liftOn₂ @[to_additive] theorem liftOn₂_mk {p : Sort} (f : M → S → M → S → p) (H) (a c : M) (b d : S) : liftOn₂ (mk a b) (mk c d) f H = f a b c d := rfl #align localization.lift_on₂_mk Localization.liftOn₂_mk #align add_localization.lift_on₂_mk AddLocalization.liftOn₂_mk @[to_additive (attr := elab_as_elim)] theorem induction_on₂ {p : Localization S → Localization S → Prop} (x y) (H : ∀ x y : M × S, p (mk x.1 x.2) (mk y.1 y.2)) : p x y := induction_on x fun x ↦ induction_on y <\| H x #align localization.induction_on₂ Localization.induction_on₂ #align add_localization.induction_on₂ AddLocalization.induction_on₂ @[to_additive (attr := elab_as_elim)] theorem induction_on₃ {p : Localization S → Localization S → Localization S → Prop} (x y z) (H : ∀ x y z : M × S, p (mk x.1 x.2) (mk y.1 y.2) (mk z.1 z.2)) : p x y z := induction_on₂ x y fun x y ↦ induction_on z <\| H x y #align localization.induction_on₃ Localization.induction_on₃ #align add_localization.induction_on₃ AddLocalization.induction_on₃ @[to_additive] theorem one_rel (y : S) : r S 1 (y, y) := fun _ hb ↦ hb y #align localization.one_rel Localization.one_rel #align add_localization.zero_rel AddLocalization.zero_rel @[to_additive] theorem r_of_eq {x y : M × S} (h : ↑y.2 x.1 = ↑x.2 * y.1) : r S x y := r_iff_exists.2 ⟨1, by rw [h]⟩ #align localization.r_of_eq Localization.r_of_eq #align add_localization.r_of_eq AddLocalization.r_of_eq @[to_additive] theorem mk_self (a : S) : mk (a : M) a = 1 := by symm rw [← mk_one, mk_eq_mk_iff] exact one_rel a #align localization.mk_self Localization.mk_self #align add_localization.mk_self AddLocalization.mk_self variable {S N} namespace Submonoid namespace LocalizationMap @[to_additive "Short for `toAddMonoidHom`; used to apply a localization map as a function."] abbrev toMap (f : LocalizationMap S N) := f.toMonoidHom #align submonoid.localization_map.to_map Submonoid.LocalizationMap.toMap #align add_submonoid.localization_map.to_map AddSubmonoid.LocalizationMap.toMap @[to_additive (attr := ext)] theorem ext {f g : LocalizationMap S N} (h : ∀ x, f.toMap x = g.toMap x) : f = g := by rcases f with ⟨⟨⟩⟩ rcases g with ⟨⟨⟩⟩ simp only [mk.injEq, MonoidHom.mk.injEq] exact OneHom.ext h #align submonoid.localization_map.ext Submonoid.LocalizationMap.ext #align add_submonoid.localization_map.ext AddSubmonoid.LocalizationMap.ext @[to_additive] theorem ext_iff {f g : LocalizationMap S N} : f = g ↔ ∀ x, f.toMap x = g.toMap x := ⟨fun h _ ↦ h ▸ rfl, ext⟩ #align submonoid.localization_map.ext_iff Submonoid.LocalizationMap.ext_iff #align add_submonoid.localization_map.ext_iff AddSubmonoid.LocalizationMap.ext_iff @[to_additive] theorem toMap_injective : Function.Injective (@LocalizationMap.toMap _ _ S N _) := fun _ _ h ↦ ext <\| DFunLike.ext_iff.1 h #align submonoid.localization_map.to_map_injective Submonoid.LocalizationMap.toMap_injective #align add_submonoid.localization_map.to_map_injective AddSubmonoid.LocalizationMap.toMap_injective @[to_additive] theorem map_units (f : LocalizationMap S N) (y : S) : IsUnit (f.toMap y) := f.2 y #align submonoid.localization_map.map_units Submonoid.LocalizationMap.map_units #align add_submonoid.localization_map.map_add_units AddSubmonoid.LocalizationMap.map_addUnits @[to_additive] theorem surj (f : LocalizationMap S N) (z : N) : ∃ x : M × S, z * f.toMap x.2 = f.toMap x.1 := f.3 z #align submonoid.localization_map.surj Submonoid.LocalizationMap.surj #align add_submonoid.localization_map.surj AddSubmonoid.LocalizationMap.surj @[to_additive "Given a localization map `f : M →+ N`, and `z w : N`, there exist `z' w' : M` and `d : S` such that `f z' - f d = z` and `f w' - f d = w`."] theorem surj₂ (f : LocalizationMap S N) (z w : N) : ∃ z' w' : M, ∃ d : S, (z * f.toMap d = f.toMap z') ∧ (w * f.toMap d = f.toMap w') := by let ⟨a, ha⟩ := surj f z let ⟨b, hb⟩ := surj f w refine ⟨a.1 * b.2, a.2 * b.1, a.2 * b.2, ?_, ?_⟩ · simp_rw [mul_def, map_mul, ← ha] exact (mul_assoc z _ _).symm · simp_rw [mul_def, map_mul, ← hb] exact mul_left_comm w _ _ @[to_additive] theorem eq_iff_exists (f : LocalizationMap S N) {x y} : f.toMap x = f.toMap y ↔ ∃ c : S, ↑c * x = c * y := Iff.intro (f.4 x y) fun ⟨c, h⟩ ↦ by replace h := congr_arg f.toMap h rw [map_mul, map_mul] at h exact (f.map_units c).mul_right_inj.mp h #align submonoid.localization_map.eq_iff_exists Submonoid.LocalizationMap.eq_iff_exists #align add_submonoid.localization_map.eq_iff_exists AddSubmonoid.LocalizationMap.eq_iff_exists @[to_additive "Given a localization map `f : M →+ N`, a section function sending `z : N` to some `(x, y) : M × S` such that `f x - f y = z`."] noncomputable def sec (f : LocalizationMap S N) (z : N) : M × S := Classical.choose <\| f.surj z #align submonoid.localization_map.sec Submonoid.LocalizationMap.sec #align add_submonoid.localization_map.sec AddSubmonoid.LocalizationMap.sec @[to_additive] theorem sec_spec {f : LocalizationMap S N} (z : N) : z * f.toMap (f.sec z).2 = f.toMap (f.sec z).1 := Classical.choose_spec <\| f.surj z #align submonoid.localization_map.sec_spec Submonoid.LocalizationMap.sec_spec #align add_submonoid.localization_map.sec_spec AddSubmonoid.LocalizationMap.sec_spec @[to_additive] theorem sec_spec' {f : LocalizationMap S N} (z : N) : f.toMap (f.sec z).1 = f.toMap (f.sec z).2 * z := by rw [mul_comm, sec_spec] #align submonoid.localization_map.sec_spec' Submonoid.LocalizationMap.sec_spec' #align add_submonoid.localization_map.sec_spec' AddSubmonoid.LocalizationMap.sec_spec' @[to_additive "Given an AddMonoidHom `f : M →+ N` and Submonoid `S ⊆ M` such that `f(S) ⊆ AddUnits N`, for all `w, z : N` and `y ∈ S`, we have `w - f y = z ↔ w = f y + z`."] theorem mul_inv_left {f : M →* N} (h : ∀ y : S, IsUnit (f y)) (y : S) (w z : N) : w * (IsUnit.liftRight (f.restrict S) h y)⁻¹ = z ↔ w = f y * z := by rw [mul_comm] exact Units.inv_mul_eq_iff_eq_mul (IsUnit.liftRight (f.restrict S) h y) #align submonoid.localization_map.mul_inv_left Submonoid.LocalizationMap.mul_inv_left #align add_submonoid.localization_map.add_neg_left AddSubmonoid.LocalizationMap.add_neg_left @[to_additive "Given an AddMonoidHom `f : M →+ N` and Submonoid `S ⊆ M` such that `f(S) ⊆ AddUnits N`, for all `w, z : N` and `y ∈ S`, we have `z = w - f y ↔ z + f y = w`."] theorem mul_inv_right {f : M →* N} (h : ∀ y : S, IsUnit (f y)) (y : S) (w z : N) : z = w * (IsUnit.liftRight (f.restrict S) h y)⁻¹ ↔ z * f y = w := by rw [eq_comm, mul_inv_left h, mul_comm, eq_comm] #align submonoid.localization_map.mul_inv_right Submonoid.LocalizationMap.mul_inv_right #align add_submonoid.localization_map.add_neg_right AddSubmonoid.LocalizationMap.add_neg_right @[to_additive (attr := simp) "Given an AddMonoidHom `f : M →+ N` and Submonoid `S ⊆ M` such that `f(S) ⊆ AddUnits N`, for all `x₁ x₂ : M` and `y₁, y₂ ∈ S`, we have `f x₁ - f y₁ = f x₂ - f y₂ ↔ f (x₁ + y₂) = f (x₂ + y₁)`."] theorem mul_inv {f : M →* N} (h : ∀ y : S, IsUnit (f y)) {x₁ x₂} {y₁ y₂ : S} : f x₁ * (IsUnit.liftRight (f.restrict S) h y₁)⁻¹ = f x₂ * (IsUnit.liftRight (f.restrict S) h y₂)⁻¹ ↔ f (x₁ * y₂) = f (x₂ * y₁) := by rw [mul_inv_right h, mul_assoc, mul_comm _ (f y₂), ← mul_assoc, mul_inv_left h, mul_comm x₂, f.map_mul, f.map_mul] #align submonoid.localization_map.mul_inv Submonoid.LocalizationMap.mul_inv #align add_submonoid.localization_map.add_neg AddSubmonoid.LocalizationMap.add_neg @[to_additive "Given an AddMonoidHom `f : M →+ N` and Submonoid `S ⊆ M` such that `f(S) ⊆ AddUnits N`, for all `y, z ∈ S`, we have `- (f y) = - (f z) → f y = f z`."] theorem inv_inj {f : M →* N} (hf : ∀ y : S, IsUnit (f y)) {y z : S} (h : (IsUnit.liftRight (f.restrict S) hf y)⁻¹ = (IsUnit.liftRight (f.restrict S) hf z)⁻¹) : f y = f z := by rw [← mul_one (f y), eq_comm, ← mul_inv_left hf y (f z) 1, h] exact Units.inv_mul (IsUnit.liftRight (f.restrict S) hf z)⁻¹ #align submonoid.localization_map.inv_inj Submonoid.LocalizationMap.inv_inj #align add_submonoid.localization_map.neg_inj AddSubmonoid.LocalizationMap.neg_inj @[to_additive "Given an AddMonoidHom `f : M →+ N` and Submonoid `S ⊆ M` such that `f(S) ⊆ AddUnits N`, for all `y ∈ S`, `- (f y)` is unique."] theorem inv_unique {f : M →* N} (h : ∀ y : S, IsUnit (f y)) {y : S} {z : N} (H : f y * z = 1) : (IsUnit.liftRight (f.restrict S) h y)⁻¹ = z := by rw [← one_mul _⁻¹, Units.val_mul, mul_inv_left] exact H.symm #align submonoid.localization_map.inv_unique Submonoid.LocalizationMap.inv_unique #align add_submonoid.localization_map.neg_unique AddSubmonoid.LocalizationMap.neg_unique variable (f : LocalizationMap S N) @[to_additive] theorem map_right_cancel {x y} {c : S} (h : f.toMap (c * x) = f.toMap (c * y)) : f.toMap x = f.toMap y := by rw [f.toMap.map_mul, f.toMap.map_mul] at h let ⟨u, hu⟩ := f.map_units c rw [← hu] at h exact (Units.mul_right_inj u).1 h #align submonoid.localization_map.map_right_cancel Submonoid.LocalizationMap.map_right_cancel #align add_submonoid.localization_map.map_right_cancel AddSubmonoid.LocalizationMap.map_right_cancel @[to_additive] theorem map_left_cancel {x y} {c : S} (h : f.toMap (x * c) = f.toMap (y * c)) : f.toMap x = f.toMap y := f.map_right_cancel <\| by rw [mul_comm _ x, mul_comm _ y, h] #align submonoid.localization_map.map_left_cancel Submonoid.LocalizationMap.map_left_cancel #align add_submonoid.localization_map.map_left_cancel AddSubmonoid.LocalizationMap.map_left_cancel @[to_additive "Given a localization map `f : M →+ N`, the surjection sending `(x, y) : M × S` to `f x - f y`."] noncomputable def mk' (f : LocalizationMap S N) (x : M) (y : S) : N := f.toMap x * ↑(IsUnit.liftRight (f.toMap.restrict S) f.map_units y)⁻¹ #align submonoid.localization_map.mk' Submonoid.LocalizationMap.mk' #align add_submonoid.localization_map.mk' AddSubmonoid.LocalizationMap.mk' @[to_additive] theorem mk'_mul (x₁ x₂ : M) (y₁ y₂ : S) : f.mk' (x₁ * x₂) (y₁ * y₂) = f.mk' x₁ y₁ * f.mk' x₂ y₂ := (mul_inv_left f.map_units _ _ _).2 <\| show _ = _ * (_ * _ * (_ * _)) by rw [← mul_assoc, ← mul_assoc, mul_inv_right f.map_units, mul_assoc, mul_assoc, mul_comm _ (f.toMap x₂), ← mul_assoc, ← mul_assoc, mul_inv_right f.map_units, Submonoid.coe_mul, f.toMap.map_mul, f.toMap.map_mul] ac_rfl #align submonoid.localization_map.mk'_mul Submonoid.LocalizationMap.mk'_mul #align add_submonoid.localization_map.mk'_add AddSubmonoid.LocalizationMap.mk'_add @[to_additive] theorem mk'_one (x) : f.mk' x (1 : S) = f.toMap x := by rw [mk', MonoidHom.map_one] exact mul_one _ #align submonoid.localization_map.mk'_one Submonoid.LocalizationMap.mk'_one #align add_submonoid.localization_map.mk'_zero AddSubmonoid.LocalizationMap.mk'_zero @[to_additive (attr := simp) "Given a localization map `f : M →+ N` for a Submonoid `S ⊆ M`, for all `z : N` we have that if `x : M, y ∈ S` are such that `z + f y = f x`, then `f x - f y = z`."] theorem mk'_sec (z : N) : f.mk' (f.sec z).1 (f.sec z).2 = z := show _ * _ = _ by rw [← sec_spec, mul_inv_left, mul_comm] #align submonoid.localization_map.mk'_sec Submonoid.LocalizationMap.mk'_sec #align add_submonoid.localization_map.mk'_sec AddSubmonoid.LocalizationMap.mk'_sec @[to_additive] theorem mk'_surjective (z : N) : ∃ (x : _) (y : S), f.mk' x y = z := ⟨(f.sec z).1, (f.sec z).2, f.mk'_sec z⟩ #align submonoid.localization_map.mk'_surjective Submonoid.LocalizationMap.mk'_surjective #align add_submonoid.localization_map.mk'_surjective AddSubmonoid.LocalizationMap.mk'_surjective @[to_additive] theorem mk'_spec (x) (y : S) : f.mk' x y * f.toMap y = f.toMap x := show _ * _ * _ = _ by rw [mul_assoc, mul_comm _ (f.toMap y), ← mul_assoc, mul_inv_left, mul_comm] #align submonoid.localization_map.mk'_spec Submonoid.LocalizationMap.mk'_spec #align add_submonoid.localization_map.mk'_spec AddSubmonoid.LocalizationMap.mk'_spec @[to_additive] theorem mk'_spec' (x) (y : S) : f.toMap y * f.mk' x y = f.toMap x := by rw [mul_comm, mk'_spec] #align submonoid.localization_map.mk'_spec' Submonoid.LocalizationMap.mk'_spec' #align add_submonoid.localization_map.mk'_spec' AddSubmonoid.LocalizationMap.mk'_spec' @[to_additive] theorem eq_mk'_iff_mul_eq {x} {y : S} {z} : z = f.mk' x y ↔ z * f.toMap y = f.toMap x := ⟨fun H ↦ by rw [H, mk'_spec], fun H ↦ by erw [mul_inv_right, H]⟩ #align submonoid.localization_map.eq_mk'_iff_mul_eq Submonoid.LocalizationMap.eq_mk'_iff_mul_eq #align add_submonoid.localization_map.eq_mk'_iff_add_eq AddSubmonoid.LocalizationMap.eq_mk'_iff_add_eq @[to_additive] theorem mk'_eq_iff_eq_mul {x} {y : S} {z} : f.mk' x y = z ↔ f.toMap x = z * f.toMap y := by rw [eq_comm, eq_mk'_iff_mul_eq, eq_comm] #align submonoid.localization_map.mk'_eq_iff_eq_mul Submonoid.LocalizationMap.mk'_eq_iff_eq_mul #align add_submonoid.localization_map.mk'_eq_iff_eq_add AddSubmonoid.LocalizationMap.mk'_eq_iff_eq_add @[to_additive] theorem mk'_eq_iff_eq {x₁ x₂} {y₁ y₂ : S} : f.mk' x₁ y₁ = f.mk' x₂ y₂ ↔ f.toMap (y₂ * x₁) = f.toMap (y₁ * x₂) := ⟨fun H ↦ by rw [f.toMap.map_mul, f.toMap.map_mul, f.mk'_eq_iff_eq_mul.1 H,← mul_assoc, mk'_spec', mul_comm ((toMap f) x₂) _], fun H ↦ by rw [mk'_eq_iff_eq_mul, mk', mul_assoc, mul_comm _ (f.toMap y₁), ← mul_assoc, ← f.toMap.map_mul, mul_comm x₂, ← H, ← mul_comm x₁, f.toMap.map_mul, mul_inv_right f.map_units]⟩ #align submonoid.localization_map.mk'_eq_iff_eq Submonoid.LocalizationMap.mk'_eq_iff_eq #align add_submonoid.localization_map.mk'_eq_iff_eq AddSubmonoid.LocalizationMap.mk'_eq_iff_eq @[to_additive] theorem mk'_eq_iff_eq' {x₁ x₂} {y₁ y₂ : S} : f.mk' x₁ y₁ = f.mk' x₂ y₂ ↔ f.toMap (x₁ * y₂) = f.toMap (x₂ * y₁) := by simp only [f.mk'_eq_iff_eq, mul_comm] #align submonoid.localization_map.mk'_eq_iff_eq' Submonoid.LocalizationMap.mk'_eq_iff_eq' #align add_submonoid.localization_map.mk'_eq_iff_eq' AddSubmonoid.LocalizationMap.mk'_eq_iff_eq' @[to_additive] protected theorem eq {a₁ b₁} {a₂ b₂ : S} : f.mk' a₁ a₂ = f.mk' b₁ b₂ ↔ ∃ c : S, ↑c * (↑b₂ * a₁) = c * (a₂ * b₁) := f.mk'_eq_iff_eq.trans <\| f.eq_iff_exists #align submonoid.localization_map.eq Submonoid.LocalizationMap.eq #align add_submonoid.localization_map.eq AddSubmonoid.LocalizationMap.eq @[to_additive] protected theorem eq' {a₁ b₁} {a₂ b₂ : S} : f.mk' a₁ a₂ = f.mk' b₁ b₂ ↔ Localization.r S (a₁, a₂) (b₁, b₂) := by rw [f.eq, Localization.r_iff_exists] #align submonoid.localization_map.eq' Submonoid.LocalizationMap.eq' #align add_submonoid.localization_map.eq' AddSubmonoid.LocalizationMap.eq' @[to_additive] theorem eq_iff_eq (g : LocalizationMap S P) {x y} : f.toMap x = f.toMap y ↔ g.toMap x = g.toMap y := f.eq_iff_exists.trans g.eq_iff_exists.symm #align submonoid.localization_map.eq_iff_eq Submonoid.LocalizationMap.eq_iff_eq #align add_submonoid.localization_map.eq_iff_eq AddSubmonoid.LocalizationMap.eq_iff_eq @[to_additive] theorem mk'_eq_iff_mk'_eq (g : LocalizationMap S P) {x₁ x₂} {y₁ y₂ : S} : f.mk' x₁ y₁ = f.mk' x₂ y₂ ↔ g.mk' x₁ y₁ = g.mk' x₂ y₂ := f.eq'.trans g.eq'.symm #align submonoid.localization_map.mk'_eq_iff_mk'_eq Submonoid.LocalizationMap.mk'_eq_iff_mk'_eq #align add_submonoid.localization_map.mk'_eq_iff_mk'_eq AddSubmonoid.LocalizationMap.mk'_eq_iff_mk'_eq @[to_additive "Given a Localization map `f : M →+ N` for a Submonoid `S ⊆ M`, for all `x₁ : M` and `y₁ ∈ S`, if `x₂ : M, y₂ ∈ S` are such that `(f x₁ - f y₁) + f y₂ = f x₂`, then there exists `c ∈ S` such that `x₁ + y₂ + c = x₂ + y₁ + c`."] theorem exists_of_sec_mk' (x) (y : S) : ∃ c : S, ↑c * (↑(f.sec <\| f.mk' x y).2 * x) = c * (y * (f.sec <\| f.mk' x y).1) := f.eq_iff_exists.1 <\| f.mk'_eq_iff_eq.1 <\| (mk'_sec _ _).symm #align submonoid.localization_map.exists_of_sec_mk' Submonoid.LocalizationMap.exists_of_sec_mk' #align add_submonoid.localization_map.exists_of_sec_mk' AddSubmonoid.LocalizationMap.exists_of_sec_mk' @[to_additive] theorem mk'_eq_of_eq {a₁ b₁ : M} {a₂ b₂ : S} (H : ↑a₂ * b₁ = ↑b₂ * a₁) : f.mk' a₁ a₂ = f.mk' b₁ b₂ := f.mk'_eq_iff_eq.2 <\| H ▸ rfl #align submonoid.localization_map.mk'_eq_of_eq Submonoid.LocalizationMap.mk'_eq_of_eq #align add_submonoid.localization_map.mk'_eq_of_eq AddSubmonoid.LocalizationMap.mk'_eq_of_eq @[to_additive] theorem mk'_eq_of_eq' {a₁ b₁ : M} {a₂ b₂ : S} (H : b₁ * ↑a₂ = a₁ * ↑b₂) : f.mk' a₁ a₂ = f.mk' b₁ b₂ := f.mk'_eq_of_eq <\| by simpa only [mul_comm] using H #align submonoid.localization_map.mk'_eq_of_eq' Submonoid.LocalizationMap.mk'_eq_of_eq' #align add_submonoid.localization_map.mk'_eq_of_eq' AddSubmonoid.LocalizationMap.mk'_eq_of_eq' @[to_additive] theorem mk'_cancel (a : M) (b c : S) : f.mk' (a * c) (b * c) = f.mk' a b := mk'_eq_of_eq' f (by rw [Submonoid.coe_mul, mul_comm (b:M), mul_assoc]) @[to_additive] theorem mk'_eq_of_same {a b} {d : S} : f.mk' a d = f.mk' b d ↔ ∃ c : S, c * a = c * b := by rw [mk'_eq_iff_eq', map_mul, map_mul, ← eq_iff_exists f] exact (map_units f d).mul_left_inj @[to_additive (attr := simp)] theorem mk'_self' (y : S) : f.mk' (y : M) y = 1 := show _ * _ = _ by rw [mul_inv_left, mul_one] #align submonoid.localization_map.mk'_self' Submonoid.LocalizationMap.mk'_self' #align add_submonoid.localization_map.mk'_self' AddSubmonoid.LocalizationMap.mk'_self' @[to_additive (attr := simp)] theorem mk'_self (x) (H : x ∈ S) : f.mk' x ⟨x, H⟩ = 1 := mk'_self' f ⟨x, H⟩ #align submonoid.localization_map.mk'_self Submonoid.LocalizationMap.mk'_self #align add_submonoid.localization_map.mk'_self AddSubmonoid.LocalizationMap.mk'_self @[to_additive] theorem mul_mk'_eq_mk'_of_mul (x₁ x₂) (y : S) : f.toMap x₁ * f.mk' x₂ y = f.mk' (x₁ * x₂) y := by rw [← mk'_one, ← mk'_mul, one_mul] #align submonoid.localization_map.mul_mk'_eq_mk'_of_mul Submonoid.LocalizationMap.mul_mk'_eq_mk'_of_mul #align add_submonoid.localization_map.add_mk'_eq_mk'_of_add AddSubmonoid.LocalizationMap.add_mk'_eq_mk'_of_add @[to_additive] theorem mk'_mul_eq_mk'_of_mul (x₁ x₂) (y : S) : f.mk' x₂ y * f.toMap x₁ = f.mk' (x₁ * x₂) y := by rw [mul_comm, mul_mk'_eq_mk'_of_mul] #align submonoid.localization_map.mk'_mul_eq_mk'_of_mul Submonoid.LocalizationMap.mk'_mul_eq_mk'_of_mul #align add_submonoid.localization_map.mk'_add_eq_mk'_of_add AddSubmonoid.LocalizationMap.mk'_add_eq_mk'_of_add @[to_additive] theorem mul_mk'_one_eq_mk' (x) (y : S) : f.toMap x * f.mk' 1 y = f.mk' x y := by rw [mul_mk'_eq_mk'_of_mul, mul_one] #align submonoid.localization_map.mul_mk'_one_eq_mk' Submonoid.LocalizationMap.mul_mk'_one_eq_mk' #align add_submonoid.localization_map.add_mk'_zero_eq_mk' AddSubmonoid.LocalizationMap.add_mk'_zero_eq_mk' @[to_additive (attr := simp)] theorem mk'_mul_cancel_right (x : M) (y : S) : f.mk' (x * y) y = f.toMap x := by rw [← mul_mk'_one_eq_mk', f.toMap.map_mul, mul_assoc, mul_mk'_one_eq_mk', mk'_self', mul_one] #align submonoid.localization_map.mk'_mul_cancel_right Submonoid.LocalizationMap.mk'_mul_cancel_right #align add_submonoid.localization_map.mk'_add_cancel_right AddSubmonoid.LocalizationMap.mk'_add_cancel_right @[to_additive] theorem mk'_mul_cancel_left (x) (y : S) : f.mk' ((y : M) * x) y = f.toMap x := by rw [mul_comm, mk'_mul_cancel_right] #align submonoid.localization_map.mk'_mul_cancel_left Submonoid.LocalizationMap.mk'_mul_cancel_left #align add_submonoid.localization_map.mk'_add_cancel_left AddSubmonoid.LocalizationMap.mk'_add_cancel_left @[to_additive] theorem isUnit_comp (j : N →* P) (y : S) : IsUnit (j.comp f.toMap y) := ⟨Units.map j <\| IsUnit.liftRight (f.toMap.restrict S) f.map_units y, show j _ = j _ from congr_arg j <\| IsUnit.coe_liftRight (f.toMap.restrict S) f.map_units _⟩ #align submonoid.localization_map.is_unit_comp Submonoid.LocalizationMap.isUnit_comp #align add_submonoid.localization_map.is_add_unit_comp AddSubmonoid.LocalizationMap.isAddUnit_comp variable {g : M →* P} @[to_additive "Given a Localization map `f : M →+ N` for a Submonoid `S ⊆ M` and a map of `AddCommMonoid`s `g : M →+ P` such that `g(S) ⊆ AddUnits P`, `f x = f y → g x = g y` for all `x y : M`."] theorem eq_of_eq (hg : ∀ y : S, IsUnit (g y)) {x y} (h : f.toMap x = f.toMap y) : g x = g y := by obtain ⟨c, hc⟩ := f.eq_iff_exists.1 h rw [← one_mul (g x), ← IsUnit.liftRight_inv_mul (g.restrict S) hg c] show _ * g c * _ = _ rw [mul_assoc, ← g.map_mul, hc, mul_comm, mul_inv_left hg, g.map_mul] #align submonoid.localization_map.eq_of_eq Submonoid.LocalizationMap.eq_of_eq #align add_submonoid.localization_map.eq_of_eq AddSubmonoid.LocalizationMap.eq_of_eq @[to_additive "Given `AddCommMonoid`s `M, P`, Localization maps `f : M →+ N, k : P →+ Q` for Submonoids `S, T` respectively, and `g : M →+ P` such that `g(S) ⊆ T`, `f x = f y` implies `k (g x) = k (g y)`."] theorem comp_eq_of_eq {T : Submonoid P} {Q : Type} [CommMonoid Q] (hg : ∀ y : S, g y ∈ T) (k : LocalizationMap T Q) {x y} (h : f.toMap x = f.toMap y) : k.toMap (g x) = k.toMap (g y) := f.eq_of_eq (fun y : S ↦ show IsUnit (k.toMap.comp g y) from k.map_units ⟨g y, hg y⟩) h #align submonoid.localization_map.comp_eq_of_eq Submonoid.LocalizationMap.comp_eq_of_eq #align add_submonoid.localization_map.comp_eq_of_eq AddSubmonoid.LocalizationMap.comp_eq_of_eq variable (hg : ∀ y : S, IsUnit (g y)) @[to_additive "Given a localization map `f : M →+ N` for a submonoid `S ⊆ M` and a map of `AddCommMonoid`s `g : M →+ P` such that `g y` is invertible for all `y : S`, the homomorphism induced from `N` to `P` sending `z : N` to `g x - g y`, where `(x, y) : M × S` are such that `z = f x - f y`."] noncomputable def lift : N → P where toFun z := g (f.sec z).1 * (IsUnit.liftRight (g.restrict S) hg (f.sec z).2)⁻¹ map_one' := by rw [mul_inv_left, mul_one]; exact f.eq_of_eq hg (by rw [← sec_spec, one_mul]) map_mul' x y := by dsimp only rw [mul_inv_left hg, ← mul_assoc, ← mul_assoc, mul_inv_right hg, mul_comm _ (g (f.sec y).1), ← mul_assoc, ← mul_assoc, mul_inv_right hg] repeat rw [← g.map_mul] exact f.eq_of_eq hg (by simp_rw [f.toMap.map_mul, sec_spec']; ac_rfl) #align submonoid.localization_map.lift Submonoid.LocalizationMap.lift #align add_submonoid.localization_map.lift AddSubmonoid.LocalizationMap.lift @[to_additive "Given a Localization map `f : M →+ N` for a Submonoid `S ⊆ M` and a map of `AddCommMonoid`s `g : M →+ P` such that `g y` is invertible for all `y : S`, the homomorphism induced from `N` to `P` maps `f x - f y` to `g x - g y` for all `x : M, y ∈ S`."] theorem lift_mk' (x y) : f.lift hg (f.mk' x y) = g x * (IsUnit.liftRight (g.restrict S) hg y)⁻¹ := (mul_inv hg).2 <\| f.eq_of_eq hg <\| by simp_rw [f.toMap.map_mul, sec_spec', mul_assoc, f.mk'_spec, mul_comm] #align submonoid.localization_map.lift_mk' Submonoid.LocalizationMap.lift_mk' #align add_submonoid.localization_map.lift_mk' AddSubmonoid.LocalizationMap.lift_mk' @[to_additive "Given a Localization map `f : M →+ N` for a Submonoid `S ⊆ M`, if an `AddCommMonoid` map `g : M →+ P` induces a map `f.lift hg : N →+ P` then for all `z : N, v : P`, we have `f.lift hg z = v ↔ g x = g y + v`, where `x : M, y ∈ S` are such that `z + f y = f x`."] theorem lift_spec (z v) : f.lift hg z = v ↔ g (f.sec z).1 = g (f.sec z).2 * v := mul_inv_left hg _ _ v #align submonoid.localization_map.lift_spec Submonoid.LocalizationMap.lift_spec #align add_submonoid.localization_map.lift_spec AddSubmonoid.LocalizationMap.lift_spec @[to_additive "Given a Localization map `f : M →+ N` for a Submonoid `S ⊆ M`, if an `AddCommMonoid` map `g : M →+ P` induces a map `f.lift hg : N →+ P` then for all `z : N, v w : P`, we have `f.lift hg z + w = v ↔ g x + w = g y + v`, where `x : M, y ∈ S` are such that `z + f y = f x`."] theorem lift_spec_mul (z w v) : f.lift hg z * w = v ↔ g (f.sec z).1 * w = g (f.sec z).2 * v := by erw [mul_comm, ← mul_assoc, mul_inv_left hg, mul_comm] #align submonoid.localization_map.lift_spec_mul Submonoid.LocalizationMap.lift_spec_mul #align add_submonoid.localization_map.lift_spec_add AddSubmonoid.LocalizationMap.lift_spec_add @[to_additive] theorem lift_mk'_spec (x v) (y : S) : f.lift hg (f.mk' x y) = v ↔ g x = g y * v := by rw [f.lift_mk' hg]; exact mul_inv_left hg _ _ _ #align submonoid.localization_map.lift_mk'_spec Submonoid.LocalizationMap.lift_mk'_spec #align add_submonoid.localization_map.lift_mk'_spec AddSubmonoid.LocalizationMap.lift_mk'_spec @[to_additive "Given a Localization map `f : M →+ N` for a Submonoid `S ⊆ M`, if an `AddCommMonoid` map `g : M →+ P` induces a map `f.lift hg : N →+ P` then for all `z : N`, we have `f.lift hg z + g y = g x`, where `x : M, y ∈ S` are such that `z + f y = f x`."] theorem lift_mul_right (z) : f.lift hg z * g (f.sec z).2 = g (f.sec z).1 := by erw [mul_assoc, IsUnit.liftRight_inv_mul, mul_one] #align submonoid.localization_map.lift_mul_right Submonoid.LocalizationMap.lift_mul_right #align add_submonoid.localization_map.lift_add_right AddSubmonoid.LocalizationMap.lift_add_right @[to_additive "Given a Localization map `f : M →+ N` for a Submonoid `S ⊆ M`, if an `AddCommMonoid` map `g : M →+ P` induces a map `f.lift hg : N →+ P` then for all `z : N`, we have `g y + f.lift hg z = g x`, where `x : M, y ∈ S` are such that `z + f y = f x`."] theorem lift_mul_left (z) : g (f.sec z).2 * f.lift hg z = g (f.sec z).1 := by rw [mul_comm, lift_mul_right] #align submonoid.localization_map.lift_mul_left Submonoid.LocalizationMap.lift_mul_left #align add_submonoid.localization_map.lift_add_left AddSubmonoid.LocalizationMap.lift_add_left @[to_additive (attr := simp)] theorem lift_eq (x : M) : f.lift hg (f.toMap x) = g x := by rw [lift_spec, ← g.map_mul]; exact f.eq_of_eq hg (by rw [sec_spec', f.toMap.map_mul]) #align submonoid.localization_map.lift_eq Submonoid.LocalizationMap.lift_eq #align add_submonoid.localization_map.lift_eq AddSubmonoid.LocalizationMap.lift_eq @[to_additive] theorem lift_eq_iff {x y : M × S} : f.lift hg (f.mk' x.1 x.2) = f.lift hg (f.mk' y.1 y.2) ↔ g (x.1 * y.2) = g (y.1 * x.2) := by rw [lift_mk', lift_mk', mul_inv hg] #align submonoid.localization_map.lift_eq_iff Submonoid.LocalizationMap.lift_eq_iff #align add_submonoid.localization_map.lift_eq_iff AddSubmonoid.LocalizationMap.lift_eq_iff @[to_additive (attr := simp)] theorem lift_comp : (f.lift hg).comp f.toMap = g := by ext; exact f.lift_eq hg _ #align submonoid.localization_map.lift_comp Submonoid.LocalizationMap.lift_comp #align add_submonoid.localization_map.lift_comp AddSubmonoid.LocalizationMap.lift_comp @[to_additive (attr := simp)] theorem lift_of_comp (j : N →* P) : f.lift (f.isUnit_comp j) = j := by ext rw [lift_spec] show j _ = j _ * _ erw [← j.map_mul, sec_spec'] #align submonoid.localization_map.lift_of_comp Submonoid.LocalizationMap.lift_of_comp #align add_submonoid.localization_map.lift_of_comp AddSubmonoid.LocalizationMap.lift_of_comp @[to_additive] theorem epic_of_localizationMap {j k : N →* P} (h : ∀ a, j.comp f.toMap a = k.comp f.toMap a) : j = k := by rw [← f.lift_of_comp j, ← f.lift_of_comp k] congr 1 with x; exact h x #align submonoid.localization_map.epic_of_localization_map Submonoid.LocalizationMap.epic_of_localizationMap #align add_submonoid.localization_map.epic_of_localization_map AddSubmonoid.LocalizationMap.epic_of_localizationMap @[to_additive]	Mathlib/GroupTheory/MonoidLocalization.lean	1,077	1,081	theorem lift_unique {j : N →* P} (hj : ∀ x, j (f.toMap x) = g x) : f.lift hg = j := by	ext rw [lift_spec, ← hj, ← hj, ← j.map_mul] apply congr_arg rw [← sec_spec']
import Mathlib.Algebra.Group.Nat import Mathlib.Algebra.Order.Sub.Canonical import Mathlib.Data.List.Perm import Mathlib.Data.Set.List import Mathlib.Init.Quot import Mathlib.Order.Hom.Basic #align_import data.multiset.basic from "leanprover-community/mathlib"@"65a1391a0106c9204fe45bc73a039f056558cb83" universe v open List Subtype Nat Function variable {α : Type} {β : Type v} {γ : Type} def Multiset.{u} (α : Type u) : Type u := Quotient (List.isSetoid α) #align multiset Multiset namespace Multiset -- Porting note: new @[coe] def ofList : List α → Multiset α := Quot.mk _ instance : Coe (List α) (Multiset α) := ⟨ofList⟩ @[simp] theorem quot_mk_to_coe (l : List α) : @Eq (Multiset α) ⟦l⟧ l := rfl #align multiset.quot_mk_to_coe Multiset.quot_mk_to_coe @[simp] theorem quot_mk_to_coe' (l : List α) : @Eq (Multiset α) (Quot.mk (· ≈ ·) l) l := rfl #align multiset.quot_mk_to_coe' Multiset.quot_mk_to_coe' @[simp] theorem quot_mk_to_coe'' (l : List α) : @Eq (Multiset α) (Quot.mk Setoid.r l) l := rfl #align multiset.quot_mk_to_coe'' Multiset.quot_mk_to_coe'' @[simp] theorem coe_eq_coe {l₁ l₂ : List α} : (l₁ : Multiset α) = l₂ ↔ l₁ ~ l₂ := Quotient.eq #align multiset.coe_eq_coe Multiset.coe_eq_coe -- Porting note: new instance; -- Porting note (#11215): TODO: move to better place instance [DecidableEq α] (l₁ l₂ : List α) : Decidable (l₁ ≈ l₂) := inferInstanceAs (Decidable (l₁ ~ l₂)) -- Porting note: `Quotient.recOnSubsingleton₂ s₁ s₂` was in parens which broke elaboration instance decidableEq [DecidableEq α] : DecidableEq (Multiset α) \| s₁, s₂ => Quotient.recOnSubsingleton₂ s₁ s₂ fun _ _ => decidable_of_iff' _ Quotient.eq #align multiset.has_decidable_eq Multiset.decidableEq protected def sizeOf [SizeOf α] (s : Multiset α) : ℕ := (Quot.liftOn s SizeOf.sizeOf) fun _ _ => Perm.sizeOf_eq_sizeOf #align multiset.sizeof Multiset.sizeOf instance [SizeOf α] : SizeOf (Multiset α) := ⟨Multiset.sizeOf⟩ protected def zero : Multiset α := @nil α #align multiset.zero Multiset.zero instance : Zero (Multiset α) := ⟨Multiset.zero⟩ instance : EmptyCollection (Multiset α) := ⟨0⟩ instance inhabitedMultiset : Inhabited (Multiset α) := ⟨0⟩ #align multiset.inhabited_multiset Multiset.inhabitedMultiset instance [IsEmpty α] : Unique (Multiset α) where default := 0 uniq := by rintro ⟨_ \| ⟨a, l⟩⟩; exacts [rfl, isEmptyElim a] @[simp] theorem coe_nil : (@nil α : Multiset α) = 0 := rfl #align multiset.coe_nil Multiset.coe_nil @[simp] theorem empty_eq_zero : (∅ : Multiset α) = 0 := rfl #align multiset.empty_eq_zero Multiset.empty_eq_zero @[simp] theorem coe_eq_zero (l : List α) : (l : Multiset α) = 0 ↔ l = [] := Iff.trans coe_eq_coe perm_nil #align multiset.coe_eq_zero Multiset.coe_eq_zero theorem coe_eq_zero_iff_isEmpty (l : List α) : (l : Multiset α) = 0 ↔ l.isEmpty := Iff.trans (coe_eq_zero l) isEmpty_iff_eq_nil.symm #align multiset.coe_eq_zero_iff_empty Multiset.coe_eq_zero_iff_isEmpty def cons (a : α) (s : Multiset α) : Multiset α := Quot.liftOn s (fun l => (a :: l : Multiset α)) fun _ _ p => Quot.sound (p.cons a) #align multiset.cons Multiset.cons @[inherit_doc Multiset.cons] infixr:67 " ::ₘ " => Multiset.cons instance : Insert α (Multiset α) := ⟨cons⟩ @[simp] theorem insert_eq_cons (a : α) (s : Multiset α) : insert a s = a ::ₘ s := rfl #align multiset.insert_eq_cons Multiset.insert_eq_cons @[simp] theorem cons_coe (a : α) (l : List α) : (a ::ₘ l : Multiset α) = (a :: l : List α) := rfl #align multiset.cons_coe Multiset.cons_coe @[simp] theorem cons_inj_left {a b : α} (s : Multiset α) : a ::ₘ s = b ::ₘ s ↔ a = b := ⟨Quot.inductionOn s fun l e => have : [a] ++ l ~ [b] ++ l := Quotient.exact e singleton_perm_singleton.1 <\| (perm_append_right_iff _).1 this, congr_arg (· ::ₘ _)⟩ #align multiset.cons_inj_left Multiset.cons_inj_left @[simp] theorem cons_inj_right (a : α) : ∀ {s t : Multiset α}, a ::ₘ s = a ::ₘ t ↔ s = t := by rintro ⟨l₁⟩ ⟨l₂⟩; simp #align multiset.cons_inj_right Multiset.cons_inj_right @[elab_as_elim] protected theorem induction {p : Multiset α → Prop} (empty : p 0) (cons : ∀ (a : α) (s : Multiset α), p s → p (a ::ₘ s)) : ∀ s, p s := by rintro ⟨l⟩; induction' l with _ _ ih <;> [exact empty; exact cons _ _ ih] #align multiset.induction Multiset.induction @[elab_as_elim] protected theorem induction_on {p : Multiset α → Prop} (s : Multiset α) (empty : p 0) (cons : ∀ (a : α) (s : Multiset α), p s → p (a ::ₘ s)) : p s := Multiset.induction empty cons s #align multiset.induction_on Multiset.induction_on theorem cons_swap (a b : α) (s : Multiset α) : a ::ₘ b ::ₘ s = b ::ₘ a ::ₘ s := Quot.inductionOn s fun _ => Quotient.sound <\| Perm.swap _ _ _ #align multiset.cons_swap Multiset.cons_swap instance : Singleton α (Multiset α) := ⟨fun a => a ::ₘ 0⟩ instance : LawfulSingleton α (Multiset α) := ⟨fun _ => rfl⟩ @[simp] theorem cons_zero (a : α) : a ::ₘ 0 = {a} := rfl #align multiset.cons_zero Multiset.cons_zero @[simp, norm_cast] theorem coe_singleton (a : α) : ([a] : Multiset α) = {a} := rfl #align multiset.coe_singleton Multiset.coe_singleton @[simp] theorem mem_singleton {a b : α} : b ∈ ({a} : Multiset α) ↔ b = a := by simp only [← cons_zero, mem_cons, iff_self_iff, or_false_iff, not_mem_zero] #align multiset.mem_singleton Multiset.mem_singleton theorem mem_singleton_self (a : α) : a ∈ ({a} : Multiset α) := by rw [← cons_zero] exact mem_cons_self _ _ #align multiset.mem_singleton_self Multiset.mem_singleton_self @[simp] theorem singleton_inj {a b : α} : ({a} : Multiset α) = {b} ↔ a = b := by simp_rw [← cons_zero] exact cons_inj_left _ #align multiset.singleton_inj Multiset.singleton_inj @[simp, norm_cast] theorem coe_eq_singleton {l : List α} {a : α} : (l : Multiset α) = {a} ↔ l = [a] := by rw [← coe_singleton, coe_eq_coe, List.perm_singleton] #align multiset.coe_eq_singleton Multiset.coe_eq_singleton @[simp] theorem singleton_eq_cons_iff {a b : α} (m : Multiset α) : {a} = b ::ₘ m ↔ a = b ∧ m = 0 := by rw [← cons_zero, cons_eq_cons] simp [eq_comm] #align multiset.singleton_eq_cons_iff Multiset.singleton_eq_cons_iff theorem pair_comm (x y : α) : ({x, y} : Multiset α) = {y, x} := cons_swap x y 0 #align multiset.pair_comm Multiset.pair_comm section ToList noncomputable def toList (s : Multiset α) := s.out' #align multiset.to_list Multiset.toList @[simp, norm_cast] theorem coe_toList (s : Multiset α) : (s.toList : Multiset α) = s := s.out_eq' #align multiset.coe_to_list Multiset.coe_toList @[simp] theorem toList_eq_nil {s : Multiset α} : s.toList = [] ↔ s = 0 := by rw [← coe_eq_zero, coe_toList] #align multiset.to_list_eq_nil Multiset.toList_eq_nil @[simp] theorem empty_toList {s : Multiset α} : s.toList.isEmpty ↔ s = 0 := isEmpty_iff_eq_nil.trans toList_eq_nil #align multiset.empty_to_list Multiset.empty_toList @[simp] theorem toList_zero : (Multiset.toList 0 : List α) = [] := toList_eq_nil.mpr rfl #align multiset.to_list_zero Multiset.toList_zero @[simp]	Mathlib/Data/Multiset/Basic.lean	493	494	theorem mem_toList {a : α} {s : Multiset α} : a ∈ s.toList ↔ a ∈ s := by	rw [← mem_coe, coe_toList]
import Mathlib.MeasureTheory.Measure.Restrict open scoped ENNReal NNReal Topology open Set MeasureTheory Measure Filter Function MeasurableSpace ENNReal variable {α β δ ι : Type*} namespace MeasureTheory variable {m0 : MeasurableSpace α} [MeasurableSpace β] {μ ν ν₁ ν₂: Measure α} {s t : Set α} section IsFiniteMeasure class IsFiniteMeasure (μ : Measure α) : Prop where measure_univ_lt_top : μ univ < ∞ #align measure_theory.is_finite_measure MeasureTheory.IsFiniteMeasure #align measure_theory.is_finite_measure.measure_univ_lt_top MeasureTheory.IsFiniteMeasure.measure_univ_lt_top	Mathlib/MeasureTheory/Measure/Typeclasses.lean	41	44	theorem not_isFiniteMeasure_iff : ¬IsFiniteMeasure μ ↔ μ Set.univ = ∞ := by	refine ⟨fun h => ?_, fun h => fun h' => h'.measure_univ_lt_top.ne h⟩ by_contra h' exact h ⟨lt_top_iff_ne_top.mpr h'⟩
import Mathlib.Algebra.Group.WithOne.Defs import Mathlib.Algebra.GroupWithZero.InjSurj import Mathlib.Algebra.GroupWithZero.Units.Equiv import Mathlib.Algebra.GroupWithZero.WithZero import Mathlib.Algebra.Order.Group.Units import Mathlib.Algebra.Order.GroupWithZero.Synonym import Mathlib.Algebra.Order.Monoid.Basic import Mathlib.Algebra.Order.Monoid.OrderDual import Mathlib.Algebra.Order.Monoid.TypeTags import Mathlib.Algebra.Order.ZeroLEOne #align_import algebra.order.monoid.with_zero.defs from "leanprover-community/mathlib"@"4dc134b97a3de65ef2ed881f3513d56260971562" #align_import algebra.order.monoid.with_zero.basic from "leanprover-community/mathlib"@"dad7ecf9a1feae63e6e49f07619b7087403fb8d4" #align_import algebra.order.with_zero from "leanprover-community/mathlib"@"655994e298904d7e5bbd1e18c95defd7b543eb94" variable {α : Type} class LinearOrderedCommMonoidWithZero (α : Type) extends LinearOrderedCommMonoid α, CommMonoidWithZero α where zero_le_one : (0 : α) ≤ 1 #align linear_ordered_comm_monoid_with_zero LinearOrderedCommMonoidWithZero class LinearOrderedCommGroupWithZero (α : Type) extends LinearOrderedCommMonoidWithZero α, CommGroupWithZero α #align linear_ordered_comm_group_with_zero LinearOrderedCommGroupWithZero instance (priority := 100) LinearOrderedCommMonoidWithZero.toZeroLeOneClass [LinearOrderedCommMonoidWithZero α] : ZeroLEOneClass α := { ‹LinearOrderedCommMonoidWithZero α› with } #align linear_ordered_comm_monoid_with_zero.to_zero_le_one_class LinearOrderedCommMonoidWithZero.toZeroLeOneClass instance (priority := 100) canonicallyOrderedAddCommMonoid.toZeroLeOneClass [CanonicallyOrderedAddCommMonoid α] [One α] : ZeroLEOneClass α := ⟨zero_le 1⟩ #align canonically_ordered_add_monoid.to_zero_le_one_class canonicallyOrderedAddCommMonoid.toZeroLeOneClass section LinearOrderedCommGroupWithZero variable [LinearOrderedCommGroupWithZero α] {a b c d : α} {m n : ℕ} -- TODO: Do we really need the following two? theorem mul_le_one₀ (ha : a ≤ 1) (hb : b ≤ 1) : a b ≤ 1 := mul_le_one' ha hb #align mul_le_one₀ mul_le_one₀ theorem one_le_mul₀ (ha : 1 ≤ a) (hb : 1 ≤ b) : 1 ≤ a * b := one_le_mul ha hb #align one_le_mul₀ one_le_mul₀ theorem le_of_le_mul_right (h : c ≠ 0) (hab : a * c ≤ b * c) : a ≤ b := by simpa only [mul_inv_cancel_right₀ h] using mul_le_mul_right' hab c⁻¹ #align le_of_le_mul_right le_of_le_mul_right theorem le_mul_inv_of_mul_le (h : c ≠ 0) (hab : a * c ≤ b) : a ≤ b * c⁻¹ := le_of_le_mul_right h (by simpa [h] using hab) #align le_mul_inv_of_mul_le le_mul_inv_of_mul_le theorem mul_inv_le_of_le_mul (hab : a ≤ b * c) : a * c⁻¹ ≤ b := by by_cases h : c = 0 · simp [h] · exact le_of_le_mul_right h (by simpa [h] using hab) #align mul_inv_le_of_le_mul mul_inv_le_of_le_mul theorem inv_le_one₀ (ha : a ≠ 0) : a⁻¹ ≤ 1 ↔ 1 ≤ a := @inv_le_one' _ _ _ _ <\| Units.mk0 a ha #align inv_le_one₀ inv_le_one₀ theorem one_le_inv₀ (ha : a ≠ 0) : 1 ≤ a⁻¹ ↔ a ≤ 1 := @one_le_inv' _ _ _ _ <\| Units.mk0 a ha #align one_le_inv₀ one_le_inv₀ theorem le_mul_inv_iff₀ (hc : c ≠ 0) : a ≤ b * c⁻¹ ↔ a * c ≤ b := ⟨fun h ↦ inv_inv c ▸ mul_inv_le_of_le_mul h, le_mul_inv_of_mul_le hc⟩ #align le_mul_inv_iff₀ le_mul_inv_iff₀ theorem mul_inv_le_iff₀ (hc : c ≠ 0) : a * c⁻¹ ≤ b ↔ a ≤ b * c := ⟨fun h ↦ inv_inv c ▸ le_mul_inv_of_mul_le (inv_ne_zero hc) h, mul_inv_le_of_le_mul⟩ #align mul_inv_le_iff₀ mul_inv_le_iff₀ theorem div_le_div₀ (a b c d : α) (hb : b ≠ 0) (hd : d ≠ 0) : a * b⁻¹ ≤ c * d⁻¹ ↔ a * d ≤ c * b := by rw [mul_inv_le_iff₀ hb, mul_right_comm, le_mul_inv_iff₀ hd] #align div_le_div₀ div_le_div₀ @[simp] theorem Units.zero_lt (u : αˣ) : (0 : α) < u := zero_lt_iff.2 <\| u.ne_zero #align units.zero_lt Units.zero_lt theorem mul_lt_mul_of_lt_of_le₀ (hab : a ≤ b) (hb : b ≠ 0) (hcd : c < d) : a * c < b * d := have hd : d ≠ 0 := ne_zero_of_lt hcd if ha : a = 0 then by rw [ha, zero_mul, zero_lt_iff] exact mul_ne_zero hb hd else if hc : c = 0 then by rw [hc, mul_zero, zero_lt_iff] exact mul_ne_zero hb hd else show Units.mk0 a ha * Units.mk0 c hc < Units.mk0 b hb * Units.mk0 d hd from mul_lt_mul_of_le_of_lt hab hcd #align mul_lt_mul_of_lt_of_le₀ mul_lt_mul_of_lt_of_le₀ theorem mul_lt_mul₀ (hab : a < b) (hcd : c < d) : a * c < b * d := mul_lt_mul_of_lt_of_le₀ hab.le (ne_zero_of_lt hab) hcd #align mul_lt_mul₀ mul_lt_mul₀ theorem mul_inv_lt_of_lt_mul₀ (h : a < b * c) : a * c⁻¹ < b := by contrapose! h simpa only [inv_inv] using mul_inv_le_of_le_mul h #align mul_inv_lt_of_lt_mul₀ mul_inv_lt_of_lt_mul₀ theorem inv_mul_lt_of_lt_mul₀ (h : a < b * c) : b⁻¹ * a < c := by rw [mul_comm] at * exact mul_inv_lt_of_lt_mul₀ h #align inv_mul_lt_of_lt_mul₀ inv_mul_lt_of_lt_mul₀ theorem mul_lt_right₀ (c : α) (h : a < b) (hc : c ≠ 0) : a * c < b * c := by contrapose! h exact le_of_le_mul_right hc h #align mul_lt_right₀ mul_lt_right₀ theorem inv_lt_one₀ (ha : a ≠ 0) : a⁻¹ < 1 ↔ 1 < a := @inv_lt_one' _ _ _ _ <\| Units.mk0 a ha theorem one_lt_inv₀ (ha : a ≠ 0) : 1 < a⁻¹ ↔ a < 1 := @one_lt_inv' _ _ _ _ <\| Units.mk0 a ha theorem inv_lt_inv₀ (ha : a ≠ 0) (hb : b ≠ 0) : a⁻¹ < b⁻¹ ↔ b < a := show (Units.mk0 a ha)⁻¹ < (Units.mk0 b hb)⁻¹ ↔ Units.mk0 b hb < Units.mk0 a ha from have : CovariantClass αˣ αˣ (· * ·) (· < ·) := IsLeftCancelMul.covariant_mul_lt_of_covariant_mul_le αˣ inv_lt_inv_iff #align inv_lt_inv₀ inv_lt_inv₀ theorem inv_le_inv₀ (ha : a ≠ 0) (hb : b ≠ 0) : a⁻¹ ≤ b⁻¹ ↔ b ≤ a := show (Units.mk0 a ha)⁻¹ ≤ (Units.mk0 b hb)⁻¹ ↔ Units.mk0 b hb ≤ Units.mk0 a ha from inv_le_inv_iff #align inv_le_inv₀ inv_le_inv₀ theorem lt_of_mul_lt_mul_of_le₀ (h : a * b < c * d) (hc : 0 < c) (hh : c ≤ a) : b < d := by have ha : a ≠ 0 := ne_of_gt (lt_of_lt_of_le hc hh) simp_rw [← inv_le_inv₀ ha (ne_of_gt hc)] at hh have := mul_lt_mul_of_lt_of_le₀ hh (inv_ne_zero (ne_of_gt hc)) h simpa [inv_mul_cancel_left₀ ha, inv_mul_cancel_left₀ (ne_of_gt hc)] using this #align lt_of_mul_lt_mul_of_le₀ lt_of_mul_lt_mul_of_le₀ theorem mul_le_mul_right₀ (hc : c ≠ 0) : a * c ≤ b * c ↔ a ≤ b := ⟨le_of_le_mul_right hc, fun hab ↦ mul_le_mul_right' hab _⟩ #align mul_le_mul_right₀ mul_le_mul_right₀ theorem mul_le_mul_left₀ (ha : a ≠ 0) : a * b ≤ a * c ↔ b ≤ c := by simp only [mul_comm a] exact mul_le_mul_right₀ ha #align mul_le_mul_left₀ mul_le_mul_left₀ theorem div_le_div_right₀ (hc : c ≠ 0) : a / c ≤ b / c ↔ a ≤ b := by rw [div_eq_mul_inv, div_eq_mul_inv, mul_le_mul_right₀ (inv_ne_zero hc)] #align div_le_div_right₀ div_le_div_right₀ theorem div_le_div_left₀ (ha : a ≠ 0) (hb : b ≠ 0) (hc : c ≠ 0) : a / b ≤ a / c ↔ c ≤ b := by simp only [div_eq_mul_inv, mul_le_mul_left₀ ha, inv_le_inv₀ hb hc] #align div_le_div_left₀ div_le_div_left₀	Mathlib/Algebra/Order/GroupWithZero/Canonical.lean	243	244	theorem le_div_iff₀ (hc : c ≠ 0) : a ≤ b / c ↔ a * c ≤ b := by	rw [div_eq_mul_inv, le_mul_inv_iff₀ hc]
import Mathlib.CategoryTheory.NatIso #align_import category_theory.bicategory.basic from "leanprover-community/mathlib"@"4c19a16e4b705bf135cf9a80ac18fcc99c438514" namespace CategoryTheory universe w v u open Category Iso -- intended to be used with explicit universe parameters @[nolint checkUnivs] class Bicategory (B : Type u) extends CategoryStruct.{v} B where -- category structure on the collection of 1-morphisms: homCategory : ∀ a b : B, Category.{w} (a ⟶ b) := by infer_instance -- left whiskering: whiskerLeft {a b c : B} (f : a ⟶ b) {g h : b ⟶ c} (η : g ⟶ h) : f ≫ g ⟶ f ≫ h -- right whiskering: whiskerRight {a b c : B} {f g : a ⟶ b} (η : f ⟶ g) (h : b ⟶ c) : f ≫ h ⟶ g ≫ h -- associator: associator {a b c d : B} (f : a ⟶ b) (g : b ⟶ c) (h : c ⟶ d) : (f ≫ g) ≫ h ≅ f ≫ g ≫ h -- left unitor: leftUnitor {a b : B} (f : a ⟶ b) : 𝟙 a ≫ f ≅ f -- right unitor: rightUnitor {a b : B} (f : a ⟶ b) : f ≫ 𝟙 b ≅ f -- axioms for left whiskering: whiskerLeft_id : ∀ {a b c} (f : a ⟶ b) (g : b ⟶ c), whiskerLeft f (𝟙 g) = 𝟙 (f ≫ g) := by aesop_cat whiskerLeft_comp : ∀ {a b c} (f : a ⟶ b) {g h i : b ⟶ c} (η : g ⟶ h) (θ : h ⟶ i), whiskerLeft f (η ≫ θ) = whiskerLeft f η ≫ whiskerLeft f θ := by aesop_cat id_whiskerLeft : ∀ {a b} {f g : a ⟶ b} (η : f ⟶ g), whiskerLeft (𝟙 a) η = (leftUnitor f).hom ≫ η ≫ (leftUnitor g).inv := by aesop_cat comp_whiskerLeft : ∀ {a b c d} (f : a ⟶ b) (g : b ⟶ c) {h h' : c ⟶ d} (η : h ⟶ h'), whiskerLeft (f ≫ g) η = (associator f g h).hom ≫ whiskerLeft f (whiskerLeft g η) ≫ (associator f g h').inv := by aesop_cat -- axioms for right whiskering: id_whiskerRight : ∀ {a b c} (f : a ⟶ b) (g : b ⟶ c), whiskerRight (𝟙 f) g = 𝟙 (f ≫ g) := by aesop_cat comp_whiskerRight : ∀ {a b c} {f g h : a ⟶ b} (η : f ⟶ g) (θ : g ⟶ h) (i : b ⟶ c), whiskerRight (η ≫ θ) i = whiskerRight η i ≫ whiskerRight θ i := by aesop_cat whiskerRight_id : ∀ {a b} {f g : a ⟶ b} (η : f ⟶ g), whiskerRight η (𝟙 b) = (rightUnitor f).hom ≫ η ≫ (rightUnitor g).inv := by aesop_cat whiskerRight_comp : ∀ {a b c d} {f f' : a ⟶ b} (η : f ⟶ f') (g : b ⟶ c) (h : c ⟶ d), whiskerRight η (g ≫ h) = (associator f g h).inv ≫ whiskerRight (whiskerRight η g) h ≫ (associator f' g h).hom := by aesop_cat -- associativity of whiskerings: whisker_assoc : ∀ {a b c d} (f : a ⟶ b) {g g' : b ⟶ c} (η : g ⟶ g') (h : c ⟶ d), whiskerRight (whiskerLeft f η) h = (associator f g h).hom ≫ whiskerLeft f (whiskerRight η h) ≫ (associator f g' h).inv := by aesop_cat -- exchange law of left and right whiskerings: whisker_exchange : ∀ {a b c} {f g : a ⟶ b} {h i : b ⟶ c} (η : f ⟶ g) (θ : h ⟶ i), whiskerLeft f θ ≫ whiskerRight η i = whiskerRight η h ≫ whiskerLeft g θ := by aesop_cat -- pentagon identity: pentagon : ∀ {a b c d e} (f : a ⟶ b) (g : b ⟶ c) (h : c ⟶ d) (i : d ⟶ e), whiskerRight (associator f g h).hom i ≫ (associator f (g ≫ h) i).hom ≫ whiskerLeft f (associator g h i).hom = (associator (f ≫ g) h i).hom ≫ (associator f g (h ≫ i)).hom := by aesop_cat -- triangle identity: triangle : ∀ {a b c} (f : a ⟶ b) (g : b ⟶ c), (associator f (𝟙 b) g).hom ≫ whiskerLeft f (leftUnitor g).hom = whiskerRight (rightUnitor f).hom g := by aesop_cat #align category_theory.bicategory CategoryTheory.Bicategory #align category_theory.bicategory.hom_category CategoryTheory.Bicategory.homCategory #align category_theory.bicategory.whisker_left CategoryTheory.Bicategory.whiskerLeft #align category_theory.bicategory.whisker_right CategoryTheory.Bicategory.whiskerRight #align category_theory.bicategory.left_unitor CategoryTheory.Bicategory.leftUnitor #align category_theory.bicategory.right_unitor CategoryTheory.Bicategory.rightUnitor #align category_theory.bicategory.whisker_left_id' CategoryTheory.Bicategory.whiskerLeft_id #align category_theory.bicategory.whisker_left_comp' CategoryTheory.Bicategory.whiskerLeft_comp #align category_theory.bicategory.id_whisker_left' CategoryTheory.Bicategory.id_whiskerLeft #align category_theory.bicategory.comp_whisker_left' CategoryTheory.Bicategory.comp_whiskerLeft #align category_theory.bicategory.id_whisker_right' CategoryTheory.Bicategory.id_whiskerRight #align category_theory.bicategory.comp_whisker_right' CategoryTheory.Bicategory.comp_whiskerRight #align category_theory.bicategory.whisker_right_id' CategoryTheory.Bicategory.whiskerRight_id #align category_theory.bicategory.whisker_right_comp' CategoryTheory.Bicategory.whiskerRight_comp #align category_theory.bicategory.whisker_assoc' CategoryTheory.Bicategory.whisker_assoc #align category_theory.bicategory.whisker_exchange' CategoryTheory.Bicategory.whisker_exchange #align category_theory.bicategory.pentagon' CategoryTheory.Bicategory.pentagon #align category_theory.bicategory.triangle' CategoryTheory.Bicategory.triangle namespace Bicategory scoped infixr:81 " ◁ " => Bicategory.whiskerLeft scoped infixl:81 " ▷ " => Bicategory.whiskerRight scoped notation "α_" => Bicategory.associator scoped notation "λ_" => Bicategory.leftUnitor scoped notation "ρ_" => Bicategory.rightUnitor attribute [instance] homCategory attribute [reassoc] whiskerLeft_comp id_whiskerLeft comp_whiskerLeft comp_whiskerRight whiskerRight_id whiskerRight_comp whisker_assoc whisker_exchange attribute [reassoc (attr := simp)] pentagon triangle attribute [simp] whiskerLeft_id whiskerLeft_comp id_whiskerLeft comp_whiskerLeft id_whiskerRight comp_whiskerRight whiskerRight_id whiskerRight_comp whisker_assoc variable {B : Type u} [Bicategory.{w, v} B] {a b c d e : B} @[reassoc (attr := simp)] theorem whiskerLeft_hom_inv (f : a ⟶ b) {g h : b ⟶ c} (η : g ≅ h) : f ◁ η.hom ≫ f ◁ η.inv = 𝟙 (f ≫ g) := by rw [← whiskerLeft_comp, hom_inv_id, whiskerLeft_id] #align category_theory.bicategory.hom_inv_whisker_left CategoryTheory.Bicategory.whiskerLeft_hom_inv @[reassoc (attr := simp)] theorem hom_inv_whiskerRight {f g : a ⟶ b} (η : f ≅ g) (h : b ⟶ c) : η.hom ▷ h ≫ η.inv ▷ h = 𝟙 (f ≫ h) := by rw [← comp_whiskerRight, hom_inv_id, id_whiskerRight] #align category_theory.bicategory.hom_inv_whisker_right CategoryTheory.Bicategory.hom_inv_whiskerRight @[reassoc (attr := simp)] theorem whiskerLeft_inv_hom (f : a ⟶ b) {g h : b ⟶ c} (η : g ≅ h) : f ◁ η.inv ≫ f ◁ η.hom = 𝟙 (f ≫ h) := by rw [← whiskerLeft_comp, inv_hom_id, whiskerLeft_id] #align category_theory.bicategory.inv_hom_whisker_left CategoryTheory.Bicategory.whiskerLeft_inv_hom @[reassoc (attr := simp)] theorem inv_hom_whiskerRight {f g : a ⟶ b} (η : f ≅ g) (h : b ⟶ c) : η.inv ▷ h ≫ η.hom ▷ h = 𝟙 (g ≫ h) := by rw [← comp_whiskerRight, inv_hom_id, id_whiskerRight] #align category_theory.bicategory.inv_hom_whisker_right CategoryTheory.Bicategory.inv_hom_whiskerRight @[simps] def whiskerLeftIso (f : a ⟶ b) {g h : b ⟶ c} (η : g ≅ h) : f ≫ g ≅ f ≫ h where hom := f ◁ η.hom inv := f ◁ η.inv #align category_theory.bicategory.whisker_left_iso CategoryTheory.Bicategory.whiskerLeftIso instance whiskerLeft_isIso (f : a ⟶ b) {g h : b ⟶ c} (η : g ⟶ h) [IsIso η] : IsIso (f ◁ η) := (whiskerLeftIso f (asIso η)).isIso_hom #align category_theory.bicategory.whisker_left_is_iso CategoryTheory.Bicategory.whiskerLeft_isIso @[simp] theorem inv_whiskerLeft (f : a ⟶ b) {g h : b ⟶ c} (η : g ⟶ h) [IsIso η] : inv (f ◁ η) = f ◁ inv η := by apply IsIso.inv_eq_of_hom_inv_id simp only [← whiskerLeft_comp, whiskerLeft_id, IsIso.hom_inv_id] #align category_theory.bicategory.inv_whisker_left CategoryTheory.Bicategory.inv_whiskerLeft @[simps!] def whiskerRightIso {f g : a ⟶ b} (η : f ≅ g) (h : b ⟶ c) : f ≫ h ≅ g ≫ h where hom := η.hom ▷ h inv := η.inv ▷ h #align category_theory.bicategory.whisker_right_iso CategoryTheory.Bicategory.whiskerRightIso instance whiskerRight_isIso {f g : a ⟶ b} (η : f ⟶ g) (h : b ⟶ c) [IsIso η] : IsIso (η ▷ h) := (whiskerRightIso (asIso η) h).isIso_hom #align category_theory.bicategory.whisker_right_is_iso CategoryTheory.Bicategory.whiskerRight_isIso @[simp] theorem inv_whiskerRight {f g : a ⟶ b} (η : f ⟶ g) (h : b ⟶ c) [IsIso η] : inv (η ▷ h) = inv η ▷ h := by apply IsIso.inv_eq_of_hom_inv_id simp only [← comp_whiskerRight, id_whiskerRight, IsIso.hom_inv_id] #align category_theory.bicategory.inv_whisker_right CategoryTheory.Bicategory.inv_whiskerRight @[reassoc (attr := simp)] theorem pentagon_inv (f : a ⟶ b) (g : b ⟶ c) (h : c ⟶ d) (i : d ⟶ e) : f ◁ (α_ g h i).inv ≫ (α_ f (g ≫ h) i).inv ≫ (α_ f g h).inv ▷ i = (α_ f g (h ≫ i)).inv ≫ (α_ (f ≫ g) h i).inv := eq_of_inv_eq_inv (by simp) #align category_theory.bicategory.pentagon_inv CategoryTheory.Bicategory.pentagon_inv @[reassoc (attr := simp)] theorem pentagon_inv_inv_hom_hom_inv (f : a ⟶ b) (g : b ⟶ c) (h : c ⟶ d) (i : d ⟶ e) : (α_ f (g ≫ h) i).inv ≫ (α_ f g h).inv ▷ i ≫ (α_ (f ≫ g) h i).hom = f ◁ (α_ g h i).hom ≫ (α_ f g (h ≫ i)).inv := by rw [← cancel_epi (f ◁ (α_ g h i).inv), ← cancel_mono (α_ (f ≫ g) h i).inv] simp #align category_theory.bicategory.pentagon_inv_inv_hom_hom_inv CategoryTheory.Bicategory.pentagon_inv_inv_hom_hom_inv @[reassoc (attr := simp)] theorem pentagon_inv_hom_hom_hom_inv (f : a ⟶ b) (g : b ⟶ c) (h : c ⟶ d) (i : d ⟶ e) : (α_ (f ≫ g) h i).inv ≫ (α_ f g h).hom ▷ i ≫ (α_ f (g ≫ h) i).hom = (α_ f g (h ≫ i)).hom ≫ f ◁ (α_ g h i).inv := eq_of_inv_eq_inv (by simp) #align category_theory.bicategory.pentagon_inv_hom_hom_hom_inv CategoryTheory.Bicategory.pentagon_inv_hom_hom_hom_inv @[reassoc (attr := simp)] theorem pentagon_hom_inv_inv_inv_inv (f : a ⟶ b) (g : b ⟶ c) (h : c ⟶ d) (i : d ⟶ e) : f ◁ (α_ g h i).hom ≫ (α_ f g (h ≫ i)).inv ≫ (α_ (f ≫ g) h i).inv = (α_ f (g ≫ h) i).inv ≫ (α_ f g h).inv ▷ i := by simp [← cancel_epi (f ◁ (α_ g h i).inv)] #align category_theory.bicategory.pentagon_hom_inv_inv_inv_inv CategoryTheory.Bicategory.pentagon_hom_inv_inv_inv_inv @[reassoc (attr := simp)] theorem pentagon_hom_hom_inv_hom_hom (f : a ⟶ b) (g : b ⟶ c) (h : c ⟶ d) (i : d ⟶ e) : (α_ (f ≫ g) h i).hom ≫ (α_ f g (h ≫ i)).hom ≫ f ◁ (α_ g h i).inv = (α_ f g h).hom ▷ i ≫ (α_ f (g ≫ h) i).hom := eq_of_inv_eq_inv (by simp) #align category_theory.bicategory.pentagon_hom_hom_inv_hom_hom CategoryTheory.Bicategory.pentagon_hom_hom_inv_hom_hom @[reassoc (attr := simp)] theorem pentagon_hom_inv_inv_inv_hom (f : a ⟶ b) (g : b ⟶ c) (h : c ⟶ d) (i : d ⟶ e) : (α_ f g (h ≫ i)).hom ≫ f ◁ (α_ g h i).inv ≫ (α_ f (g ≫ h) i).inv = (α_ (f ≫ g) h i).inv ≫ (α_ f g h).hom ▷ i := by rw [← cancel_epi (α_ f g (h ≫ i)).inv, ← cancel_mono ((α_ f g h).inv ▷ i)] simp #align category_theory.bicategory.pentagon_hom_inv_inv_inv_hom CategoryTheory.Bicategory.pentagon_hom_inv_inv_inv_hom @[reassoc (attr := simp)] theorem pentagon_hom_hom_inv_inv_hom (f : a ⟶ b) (g : b ⟶ c) (h : c ⟶ d) (i : d ⟶ e) : (α_ f (g ≫ h) i).hom ≫ f ◁ (α_ g h i).hom ≫ (α_ f g (h ≫ i)).inv = (α_ f g h).inv ▷ i ≫ (α_ (f ≫ g) h i).hom := eq_of_inv_eq_inv (by simp) #align category_theory.bicategory.pentagon_hom_hom_inv_inv_hom CategoryTheory.Bicategory.pentagon_hom_hom_inv_inv_hom @[reassoc (attr := simp)] theorem pentagon_inv_hom_hom_hom_hom (f : a ⟶ b) (g : b ⟶ c) (h : c ⟶ d) (i : d ⟶ e) : (α_ f g h).inv ▷ i ≫ (α_ (f ≫ g) h i).hom ≫ (α_ f g (h ≫ i)).hom = (α_ f (g ≫ h) i).hom ≫ f ◁ (α_ g h i).hom := by simp [← cancel_epi ((α_ f g h).hom ▷ i)] #align category_theory.bicategory.pentagon_inv_hom_hom_hom_hom CategoryTheory.Bicategory.pentagon_inv_hom_hom_hom_hom @[reassoc (attr := simp)] theorem pentagon_inv_inv_hom_inv_inv (f : a ⟶ b) (g : b ⟶ c) (h : c ⟶ d) (i : d ⟶ e) : (α_ f g (h ≫ i)).inv ≫ (α_ (f ≫ g) h i).inv ≫ (α_ f g h).hom ▷ i = f ◁ (α_ g h i).inv ≫ (α_ f (g ≫ h) i).inv := eq_of_inv_eq_inv (by simp) #align category_theory.bicategory.pentagon_inv_inv_hom_inv_inv CategoryTheory.Bicategory.pentagon_inv_inv_hom_inv_inv theorem triangle_assoc_comp_left (f : a ⟶ b) (g : b ⟶ c) : (α_ f (𝟙 b) g).hom ≫ f ◁ (λ_ g).hom = (ρ_ f).hom ▷ g := triangle f g #align category_theory.bicategory.triangle_assoc_comp_left CategoryTheory.Bicategory.triangle_assoc_comp_left @[reassoc (attr := simp)] theorem triangle_assoc_comp_right (f : a ⟶ b) (g : b ⟶ c) : (α_ f (𝟙 b) g).inv ≫ (ρ_ f).hom ▷ g = f ◁ (λ_ g).hom := by rw [← triangle, inv_hom_id_assoc] #align category_theory.bicategory.triangle_assoc_comp_right CategoryTheory.Bicategory.triangle_assoc_comp_right @[reassoc (attr := simp)] theorem triangle_assoc_comp_right_inv (f : a ⟶ b) (g : b ⟶ c) : (ρ_ f).inv ▷ g ≫ (α_ f (𝟙 b) g).hom = f ◁ (λ_ g).inv := by simp [← cancel_mono (f ◁ (λ_ g).hom)] #align category_theory.bicategory.triangle_assoc_comp_right_inv CategoryTheory.Bicategory.triangle_assoc_comp_right_inv @[reassoc (attr := simp)] theorem triangle_assoc_comp_left_inv (f : a ⟶ b) (g : b ⟶ c) : f ◁ (λ_ g).inv ≫ (α_ f (𝟙 b) g).inv = (ρ_ f).inv ▷ g := by simp [← cancel_mono ((ρ_ f).hom ▷ g)] #align category_theory.bicategory.triangle_assoc_comp_left_inv CategoryTheory.Bicategory.triangle_assoc_comp_left_inv @[reassoc] theorem associator_naturality_left {f f' : a ⟶ b} (η : f ⟶ f') (g : b ⟶ c) (h : c ⟶ d) : η ▷ g ▷ h ≫ (α_ f' g h).hom = (α_ f g h).hom ≫ η ▷ (g ≫ h) := by simp #align category_theory.bicategory.associator_naturality_left CategoryTheory.Bicategory.associator_naturality_left @[reassoc] theorem associator_inv_naturality_left {f f' : a ⟶ b} (η : f ⟶ f') (g : b ⟶ c) (h : c ⟶ d) : η ▷ (g ≫ h) ≫ (α_ f' g h).inv = (α_ f g h).inv ≫ η ▷ g ▷ h := by simp #align category_theory.bicategory.associator_inv_naturality_left CategoryTheory.Bicategory.associator_inv_naturality_left @[reassoc] theorem whiskerRight_comp_symm {f f' : a ⟶ b} (η : f ⟶ f') (g : b ⟶ c) (h : c ⟶ d) : η ▷ g ▷ h = (α_ f g h).hom ≫ η ▷ (g ≫ h) ≫ (α_ f' g h).inv := by simp #align category_theory.bicategory.whisker_right_comp_symm CategoryTheory.Bicategory.whiskerRight_comp_symm @[reassoc] theorem associator_naturality_middle (f : a ⟶ b) {g g' : b ⟶ c} (η : g ⟶ g') (h : c ⟶ d) : (f ◁ η) ▷ h ≫ (α_ f g' h).hom = (α_ f g h).hom ≫ f ◁ η ▷ h := by simp #align category_theory.bicategory.associator_naturality_middle CategoryTheory.Bicategory.associator_naturality_middle @[reassoc] theorem associator_inv_naturality_middle (f : a ⟶ b) {g g' : b ⟶ c} (η : g ⟶ g') (h : c ⟶ d) : f ◁ η ▷ h ≫ (α_ f g' h).inv = (α_ f g h).inv ≫ (f ◁ η) ▷ h := by simp #align category_theory.bicategory.associator_inv_naturality_middle CategoryTheory.Bicategory.associator_inv_naturality_middle @[reassoc] theorem whisker_assoc_symm (f : a ⟶ b) {g g' : b ⟶ c} (η : g ⟶ g') (h : c ⟶ d) : f ◁ η ▷ h = (α_ f g h).inv ≫ (f ◁ η) ▷ h ≫ (α_ f g' h).hom := by simp #align category_theory.bicategory.whisker_assoc_symm CategoryTheory.Bicategory.whisker_assoc_symm @[reassoc] theorem associator_naturality_right (f : a ⟶ b) (g : b ⟶ c) {h h' : c ⟶ d} (η : h ⟶ h') : (f ≫ g) ◁ η ≫ (α_ f g h').hom = (α_ f g h).hom ≫ f ◁ g ◁ η := by simp #align category_theory.bicategory.associator_naturality_right CategoryTheory.Bicategory.associator_naturality_right @[reassoc] theorem associator_inv_naturality_right (f : a ⟶ b) (g : b ⟶ c) {h h' : c ⟶ d} (η : h ⟶ h') : f ◁ g ◁ η ≫ (α_ f g h').inv = (α_ f g h).inv ≫ (f ≫ g) ◁ η := by simp #align category_theory.bicategory.associator_inv_naturality_right CategoryTheory.Bicategory.associator_inv_naturality_right @[reassoc] theorem comp_whiskerLeft_symm (f : a ⟶ b) (g : b ⟶ c) {h h' : c ⟶ d} (η : h ⟶ h') : f ◁ g ◁ η = (α_ f g h).inv ≫ (f ≫ g) ◁ η ≫ (α_ f g h').hom := by simp #align category_theory.bicategory.comp_whisker_left_symm CategoryTheory.Bicategory.comp_whiskerLeft_symm @[reassoc] theorem leftUnitor_naturality {f g : a ⟶ b} (η : f ⟶ g) : 𝟙 a ◁ η ≫ (λ_ g).hom = (λ_ f).hom ≫ η := by simp #align category_theory.bicategory.left_unitor_naturality CategoryTheory.Bicategory.leftUnitor_naturality @[reassoc] theorem leftUnitor_inv_naturality {f g : a ⟶ b} (η : f ⟶ g) : η ≫ (λ_ g).inv = (λ_ f).inv ≫ 𝟙 a ◁ η := by simp #align category_theory.bicategory.left_unitor_inv_naturality CategoryTheory.Bicategory.leftUnitor_inv_naturality theorem id_whiskerLeft_symm {f g : a ⟶ b} (η : f ⟶ g) : η = (λ_ f).inv ≫ 𝟙 a ◁ η ≫ (λ_ g).hom := by simp #align category_theory.bicategory.id_whisker_left_symm CategoryTheory.Bicategory.id_whiskerLeft_symm @[reassoc] theorem rightUnitor_naturality {f g : a ⟶ b} (η : f ⟶ g) : η ▷ 𝟙 b ≫ (ρ_ g).hom = (ρ_ f).hom ≫ η := by simp #align category_theory.bicategory.right_unitor_naturality CategoryTheory.Bicategory.rightUnitor_naturality @[reassoc] theorem rightUnitor_inv_naturality {f g : a ⟶ b} (η : f ⟶ g) : η ≫ (ρ_ g).inv = (ρ_ f).inv ≫ η ▷ 𝟙 b := by simp #align category_theory.bicategory.right_unitor_inv_naturality CategoryTheory.Bicategory.rightUnitor_inv_naturality theorem whiskerRight_id_symm {f g : a ⟶ b} (η : f ⟶ g) : η = (ρ_ f).inv ≫ η ▷ 𝟙 b ≫ (ρ_ g).hom := by simp #align category_theory.bicategory.whisker_right_id_symm CategoryTheory.Bicategory.whiskerRight_id_symm theorem whiskerLeft_iff {f g : a ⟶ b} (η θ : f ⟶ g) : 𝟙 a ◁ η = 𝟙 a ◁ θ ↔ η = θ := by simp #align category_theory.bicategory.whisker_left_iff CategoryTheory.Bicategory.whiskerLeft_iff	Mathlib/CategoryTheory/Bicategory/Basic.lean	415	415	theorem whiskerRight_iff {f g : a ⟶ b} (η θ : f ⟶ g) : η ▷ 𝟙 b = θ ▷ 𝟙 b ↔ η = θ := by	simp
import Mathlib.LinearAlgebra.CliffordAlgebra.Conjugation #align_import linear_algebra.clifford_algebra.fold from "leanprover-community/mathlib"@"446eb51ce0a90f8385f260d2b52e760e2004246b" universe u1 u2 u3 variable {R M N : Type*} variable [CommRing R] [AddCommGroup M] [AddCommGroup N] variable [Module R M] [Module R N] variable (Q : QuadraticForm R M) namespace CliffordAlgebra section Foldl def foldl (f : M →ₗ[R] N →ₗ[R] N) (hf : ∀ m x, f m (f m x) = Q m • x) : N →ₗ[R] CliffordAlgebra Q →ₗ[R] N := LinearMap.compl₂ (foldr Q f hf) reverse #align clifford_algebra.foldl CliffordAlgebra.foldl @[simp] theorem foldl_reverse (f : M →ₗ[R] N →ₗ[R] N) (hf) (n : N) (x : CliffordAlgebra Q) : foldl Q f hf n (reverse x) = foldr Q f hf n x := DFunLike.congr_arg (foldr Q f hf n) <\| reverse_reverse _ #align clifford_algebra.foldl_reverse CliffordAlgebra.foldl_reverse @[simp] theorem foldr_reverse (f : M →ₗ[R] N →ₗ[R] N) (hf) (n : N) (x : CliffordAlgebra Q) : foldr Q f hf n (reverse x) = foldl Q f hf n x := rfl #align clifford_algebra.foldr_reverse CliffordAlgebra.foldr_reverse @[simp] theorem foldl_ι (f : M →ₗ[R] N →ₗ[R] N) (hf) (n : N) (m : M) : foldl Q f hf n (ι Q m) = f m n := by rw [← foldr_reverse, reverse_ι, foldr_ι] #align clifford_algebra.foldl_ι CliffordAlgebra.foldl_ι @[simp]	Mathlib/LinearAlgebra/CliffordAlgebra/Fold.lean	115	117	theorem foldl_algebraMap (f : M →ₗ[R] N →ₗ[R] N) (hf) (n : N) (r : R) : foldl Q f hf n (algebraMap R _ r) = r • n := by	rw [← foldr_reverse, reverse.commutes, foldr_algebraMap]
import Mathlib.Algebra.MvPolynomial.Supported import Mathlib.RingTheory.WittVector.Truncated #align_import ring_theory.witt_vector.mul_coeff from "leanprover-community/mathlib"@"2f5b500a507264de86d666a5f87ddb976e2d8de4" noncomputable section namespace WittVector variable (p : ℕ) [hp : Fact p.Prime] variable {k : Type} [CommRing k] local notation "𝕎" => WittVector p -- Porting note: new notation local notation "𝕄" => MvPolynomial (Fin 2 × ℕ) ℤ open Finset MvPolynomial def wittPolyProd (n : ℕ) : 𝕄 := rename (Prod.mk (0 : Fin 2)) (wittPolynomial p ℤ n) rename (Prod.mk (1 : Fin 2)) (wittPolynomial p ℤ n) #align witt_vector.witt_poly_prod WittVector.wittPolyProd theorem wittPolyProd_vars (n : ℕ) : (wittPolyProd p n).vars ⊆ univ ×ˢ range (n + 1) := by rw [wittPolyProd] apply Subset.trans (vars_mul _ _) refine union_subset ?_ ?_ <;> · refine Subset.trans (vars_rename _ _) ?_ simp [wittPolynomial_vars, image_subset_iff] #align witt_vector.witt_poly_prod_vars WittVector.wittPolyProd_vars def wittPolyProdRemainder (n : ℕ) : 𝕄 := ∑ i ∈ range n, (p : 𝕄) ^ i * wittMul p i ^ p ^ (n - i) #align witt_vector.witt_poly_prod_remainder WittVector.wittPolyProdRemainder theorem wittPolyProdRemainder_vars (n : ℕ) : (wittPolyProdRemainder p n).vars ⊆ univ ×ˢ range n := by rw [wittPolyProdRemainder] refine Subset.trans (vars_sum_subset _ _) ?_ rw [biUnion_subset] intro x hx apply Subset.trans (vars_mul _ _) refine union_subset ?_ ?_ · apply Subset.trans (vars_pow _ _) have : (p : 𝕄) = C (p : ℤ) := by simp only [Int.cast_natCast, eq_intCast] rw [this, vars_C] apply empty_subset · apply Subset.trans (vars_pow _ _) apply Subset.trans (wittMul_vars _ _) apply product_subset_product (Subset.refl _) simp only [mem_range, range_subset] at hx ⊢ exact hx #align witt_vector.witt_poly_prod_remainder_vars WittVector.wittPolyProdRemainder_vars def remainder (n : ℕ) : 𝕄 := (∑ x ∈ range (n + 1), (rename (Prod.mk 0)) ((monomial (Finsupp.single x (p ^ (n + 1 - x)))) ((p : ℤ) ^ x))) * ∑ x ∈ range (n + 1), (rename (Prod.mk 1)) ((monomial (Finsupp.single x (p ^ (n + 1 - x)))) ((p : ℤ) ^ x)) #align witt_vector.remainder WittVector.remainder theorem remainder_vars (n : ℕ) : (remainder p n).vars ⊆ univ ×ˢ range (n + 1) := by rw [remainder] apply Subset.trans (vars_mul _ _) refine union_subset ?_ ?_ <;> · refine Subset.trans (vars_sum_subset _ _) ?_ rw [biUnion_subset] intro x hx rw [rename_monomial, vars_monomial, Finsupp.mapDomain_single] · apply Subset.trans Finsupp.support_single_subset simpa using mem_range.mp hx · apply pow_ne_zero exact mod_cast hp.out.ne_zero #align witt_vector.remainder_vars WittVector.remainder_vars def polyOfInterest (n : ℕ) : 𝕄 := wittMul p (n + 1) + (p : 𝕄) ^ (n + 1) * X (0, n + 1) * X (1, n + 1) - X (0, n + 1) * rename (Prod.mk (1 : Fin 2)) (wittPolynomial p ℤ (n + 1)) - X (1, n + 1) * rename (Prod.mk (0 : Fin 2)) (wittPolynomial p ℤ (n + 1)) #align witt_vector.poly_of_interest WittVector.polyOfInterest theorem mul_polyOfInterest_aux1 (n : ℕ) : ∑ i ∈ range (n + 1), (p : 𝕄) ^ i * wittMul p i ^ p ^ (n - i) = wittPolyProd p n := by simp only [wittPolyProd] convert wittStructureInt_prop p (X (0 : Fin 2) * X 1) n using 1 · simp only [wittPolynomial, wittMul] rw [AlgHom.map_sum] congr 1 with i congr 1 have hsupp : (Finsupp.single i (p ^ (n - i))).support = {i} := by rw [Finsupp.support_eq_singleton] simp only [and_true_iff, Finsupp.single_eq_same, eq_self_iff_true, Ne] exact pow_ne_zero _ hp.out.ne_zero simp only [bind₁_monomial, hsupp, Int.cast_natCast, prod_singleton, eq_intCast, Finsupp.single_eq_same, C_pow, mul_eq_mul_left_iff, true_or_iff, eq_self_iff_true, Int.cast_pow] · simp only [map_mul, bind₁_X_right] #align witt_vector.mul_poly_of_interest_aux1 WittVector.mul_polyOfInterest_aux1 theorem mul_polyOfInterest_aux2 (n : ℕ) : (p : 𝕄) ^ n * wittMul p n + wittPolyProdRemainder p n = wittPolyProd p n := by convert mul_polyOfInterest_aux1 p n rw [sum_range_succ, add_comm, Nat.sub_self, pow_zero, pow_one] rfl #align witt_vector.mul_poly_of_interest_aux2 WittVector.mul_polyOfInterest_aux2 theorem mul_polyOfInterest_aux3 (n : ℕ) : wittPolyProd p (n + 1) = -((p : 𝕄) ^ (n + 1) * X (0, n + 1)) * ((p : 𝕄) ^ (n + 1) * X (1, n + 1)) + (p : 𝕄) ^ (n + 1) * X (0, n + 1) * rename (Prod.mk (1 : Fin 2)) (wittPolynomial p ℤ (n + 1)) + (p : 𝕄) ^ (n + 1) * X (1, n + 1) * rename (Prod.mk (0 : Fin 2)) (wittPolynomial p ℤ (n + 1)) + remainder p n := by -- a useful auxiliary fact have mvpz : (p : 𝕄) ^ (n + 1) = MvPolynomial.C ((p : ℤ) ^ (n + 1)) := by norm_cast -- Porting note: the original proof applies `sum_range_succ` through a non-`conv` rewrite, -- but this does not work in Lean 4; the whole proof also times out very badly. The proof has been -- nearly totally rewritten here and now finishes quite fast. rw [wittPolyProd, wittPolynomial, AlgHom.map_sum, AlgHom.map_sum] conv_lhs => arg 1 rw [sum_range_succ, ← C_mul_X_pow_eq_monomial, tsub_self, pow_zero, pow_one, map_mul, rename_C, rename_X, ← mvpz] conv_lhs => arg 2 rw [sum_range_succ, ← C_mul_X_pow_eq_monomial, tsub_self, pow_zero, pow_one, map_mul, rename_C, rename_X, ← mvpz] conv_rhs => enter [1, 1, 2, 2] rw [sum_range_succ, ← C_mul_X_pow_eq_monomial, tsub_self, pow_zero, pow_one, map_mul, rename_C, rename_X, ← mvpz] conv_rhs => enter [1, 2, 2] rw [sum_range_succ, ← C_mul_X_pow_eq_monomial, tsub_self, pow_zero, pow_one, map_mul, rename_C, rename_X, ← mvpz] simp only [add_mul, mul_add] rw [add_comm _ (remainder p n)] simp only [add_assoc] apply congrArg (Add.add _) ring #align witt_vector.mul_poly_of_interest_aux3 WittVector.mul_polyOfInterest_aux3 theorem mul_polyOfInterest_aux4 (n : ℕ) : (p : 𝕄) ^ (n + 1) * wittMul p (n + 1) = -((p : 𝕄) ^ (n + 1) * X (0, n + 1)) * ((p : 𝕄) ^ (n + 1) * X (1, n + 1)) + (p : 𝕄) ^ (n + 1) * X (0, n + 1) * rename (Prod.mk (1 : Fin 2)) (wittPolynomial p ℤ (n + 1)) + (p : 𝕄) ^ (n + 1) * X (1, n + 1) * rename (Prod.mk (0 : Fin 2)) (wittPolynomial p ℤ (n + 1)) + (remainder p n - wittPolyProdRemainder p (n + 1)) := by rw [← add_sub_assoc, eq_sub_iff_add_eq, mul_polyOfInterest_aux2] exact mul_polyOfInterest_aux3 _ _ #align witt_vector.mul_poly_of_interest_aux4 WittVector.mul_polyOfInterest_aux4 theorem mul_polyOfInterest_aux5 (n : ℕ) : (p : 𝕄) ^ (n + 1) * polyOfInterest p n = remainder p n - wittPolyProdRemainder p (n + 1) := by simp only [polyOfInterest, mul_sub, mul_add, sub_eq_iff_eq_add'] rw [mul_polyOfInterest_aux4 p n] ring #align witt_vector.mul_poly_of_interest_aux5 WittVector.mul_polyOfInterest_aux5 theorem mul_polyOfInterest_vars (n : ℕ) : ((p : 𝕄) ^ (n + 1) * polyOfInterest p n).vars ⊆ univ ×ˢ range (n + 1) := by rw [mul_polyOfInterest_aux5] apply Subset.trans (vars_sub_subset _) refine union_subset ?_ ?_ · apply remainder_vars · apply wittPolyProdRemainder_vars #align witt_vector.mul_poly_of_interest_vars WittVector.mul_polyOfInterest_vars	Mathlib/RingTheory/WittVector/MulCoeff.lean	205	212	theorem polyOfInterest_vars_eq (n : ℕ) : (polyOfInterest p n).vars = ((p : 𝕄) ^ (n + 1) * (wittMul p (n + 1) + (p : 𝕄) ^ (n + 1) * X (0, n + 1) * X (1, n + 1) - X (0, n + 1) * rename (Prod.mk (1 : Fin 2)) (wittPolynomial p ℤ (n + 1)) - X (1, n + 1) * rename (Prod.mk (0 : Fin 2)) (wittPolynomial p ℤ (n + 1)))).vars := by	have : (p : 𝕄) ^ (n + 1) = C ((p : ℤ) ^ (n + 1)) := by norm_cast rw [polyOfInterest, this, vars_C_mul] apply pow_ne_zero exact mod_cast hp.out.ne_zero
import Mathlib.Analysis.SpecialFunctions.Trigonometric.Basic import Mathlib.Analysis.Normed.Group.AddCircle import Mathlib.Algebra.CharZero.Quotient import Mathlib.Topology.Instances.Sign #align_import analysis.special_functions.trigonometric.angle from "leanprover-community/mathlib"@"213b0cff7bc5ab6696ee07cceec80829ce42efec" open Real noncomputable section namespace Real -- Porting note: can't derive `NormedAddCommGroup, Inhabited` def Angle : Type := AddCircle (2 * π) #align real.angle Real.Angle namespace Angle -- Porting note (#10754): added due to missing instances due to no deriving instance : NormedAddCommGroup Angle := inferInstanceAs (NormedAddCommGroup (AddCircle (2 * π))) -- Porting note (#10754): added due to missing instances due to no deriving instance : Inhabited Angle := inferInstanceAs (Inhabited (AddCircle (2 * π))) -- Porting note (#10754): added due to missing instances due to no deriving -- also, without this, a plain `QuotientAddGroup.mk` -- causes coerced terms to be of type `ℝ ⧸ AddSubgroup.zmultiples (2 * π)` @[coe] protected def coe (r : ℝ) : Angle := QuotientAddGroup.mk r instance : Coe ℝ Angle := ⟨Angle.coe⟩ instance : CircularOrder Real.Angle := QuotientAddGroup.circularOrder (hp' := ⟨by norm_num [pi_pos]⟩) @[continuity] theorem continuous_coe : Continuous ((↑) : ℝ → Angle) := continuous_quotient_mk' #align real.angle.continuous_coe Real.Angle.continuous_coe def coeHom : ℝ →+ Angle := QuotientAddGroup.mk' _ #align real.angle.coe_hom Real.Angle.coeHom @[simp] theorem coe_coeHom : (coeHom : ℝ → Angle) = ((↑) : ℝ → Angle) := rfl #align real.angle.coe_coe_hom Real.Angle.coe_coeHom @[elab_as_elim] protected theorem induction_on {p : Angle → Prop} (θ : Angle) (h : ∀ x : ℝ, p x) : p θ := Quotient.inductionOn' θ h #align real.angle.induction_on Real.Angle.induction_on @[simp] theorem coe_zero : ↑(0 : ℝ) = (0 : Angle) := rfl #align real.angle.coe_zero Real.Angle.coe_zero @[simp] theorem coe_add (x y : ℝ) : ↑(x + y : ℝ) = (↑x + ↑y : Angle) := rfl #align real.angle.coe_add Real.Angle.coe_add @[simp] theorem coe_neg (x : ℝ) : ↑(-x : ℝ) = -(↑x : Angle) := rfl #align real.angle.coe_neg Real.Angle.coe_neg @[simp] theorem coe_sub (x y : ℝ) : ↑(x - y : ℝ) = (↑x - ↑y : Angle) := rfl #align real.angle.coe_sub Real.Angle.coe_sub theorem coe_nsmul (n : ℕ) (x : ℝ) : ↑(n • x : ℝ) = n • (↑x : Angle) := rfl #align real.angle.coe_nsmul Real.Angle.coe_nsmul theorem coe_zsmul (z : ℤ) (x : ℝ) : ↑(z • x : ℝ) = z • (↑x : Angle) := rfl #align real.angle.coe_zsmul Real.Angle.coe_zsmul @[simp, norm_cast] theorem natCast_mul_eq_nsmul (x : ℝ) (n : ℕ) : ↑((n : ℝ) * x) = n • (↑x : Angle) := by simpa only [nsmul_eq_mul] using coeHom.map_nsmul x n #align real.angle.coe_nat_mul_eq_nsmul Real.Angle.natCast_mul_eq_nsmul @[simp, norm_cast] theorem intCast_mul_eq_zsmul (x : ℝ) (n : ℤ) : ↑((n : ℝ) * x : ℝ) = n • (↑x : Angle) := by simpa only [zsmul_eq_mul] using coeHom.map_zsmul x n #align real.angle.coe_int_mul_eq_zsmul Real.Angle.intCast_mul_eq_zsmul @[deprecated (since := "2024-05-25")] alias coe_nat_mul_eq_nsmul := natCast_mul_eq_nsmul @[deprecated (since := "2024-05-25")] alias coe_int_mul_eq_zsmul := intCast_mul_eq_zsmul theorem angle_eq_iff_two_pi_dvd_sub {ψ θ : ℝ} : (θ : Angle) = ψ ↔ ∃ k : ℤ, θ - ψ = 2 * π * k := by simp only [QuotientAddGroup.eq, AddSubgroup.zmultiples_eq_closure, AddSubgroup.mem_closure_singleton, zsmul_eq_mul', (sub_eq_neg_add _ _).symm, eq_comm] -- Porting note: added `rw`, `simp [Angle.coe, QuotientAddGroup.eq]` doesn't fire otherwise rw [Angle.coe, Angle.coe, QuotientAddGroup.eq] simp only [AddSubgroup.zmultiples_eq_closure, AddSubgroup.mem_closure_singleton, zsmul_eq_mul', (sub_eq_neg_add _ _).symm, eq_comm] #align real.angle.angle_eq_iff_two_pi_dvd_sub Real.Angle.angle_eq_iff_two_pi_dvd_sub @[simp] theorem coe_two_pi : ↑(2 * π : ℝ) = (0 : Angle) := angle_eq_iff_two_pi_dvd_sub.2 ⟨1, by rw [sub_zero, Int.cast_one, mul_one]⟩ #align real.angle.coe_two_pi Real.Angle.coe_two_pi @[simp] theorem neg_coe_pi : -(π : Angle) = π := by rw [← coe_neg, angle_eq_iff_two_pi_dvd_sub] use -1 simp [two_mul, sub_eq_add_neg] #align real.angle.neg_coe_pi Real.Angle.neg_coe_pi @[simp] theorem two_nsmul_coe_div_two (θ : ℝ) : (2 : ℕ) • (↑(θ / 2) : Angle) = θ := by rw [← coe_nsmul, two_nsmul, add_halves] #align real.angle.two_nsmul_coe_div_two Real.Angle.two_nsmul_coe_div_two @[simp] theorem two_zsmul_coe_div_two (θ : ℝ) : (2 : ℤ) • (↑(θ / 2) : Angle) = θ := by rw [← coe_zsmul, two_zsmul, add_halves] #align real.angle.two_zsmul_coe_div_two Real.Angle.two_zsmul_coe_div_two -- Porting note (#10618): @[simp] can prove it theorem two_nsmul_neg_pi_div_two : (2 : ℕ) • (↑(-π / 2) : Angle) = π := by rw [two_nsmul_coe_div_two, coe_neg, neg_coe_pi] #align real.angle.two_nsmul_neg_pi_div_two Real.Angle.two_nsmul_neg_pi_div_two -- Porting note (#10618): @[simp] can prove it theorem two_zsmul_neg_pi_div_two : (2 : ℤ) • (↑(-π / 2) : Angle) = π := by rw [two_zsmul, ← two_nsmul, two_nsmul_neg_pi_div_two] #align real.angle.two_zsmul_neg_pi_div_two Real.Angle.two_zsmul_neg_pi_div_two theorem sub_coe_pi_eq_add_coe_pi (θ : Angle) : θ - π = θ + π := by rw [sub_eq_add_neg, neg_coe_pi] #align real.angle.sub_coe_pi_eq_add_coe_pi Real.Angle.sub_coe_pi_eq_add_coe_pi @[simp] theorem two_nsmul_coe_pi : (2 : ℕ) • (π : Angle) = 0 := by simp [← natCast_mul_eq_nsmul] #align real.angle.two_nsmul_coe_pi Real.Angle.two_nsmul_coe_pi @[simp] theorem two_zsmul_coe_pi : (2 : ℤ) • (π : Angle) = 0 := by simp [← intCast_mul_eq_zsmul] #align real.angle.two_zsmul_coe_pi Real.Angle.two_zsmul_coe_pi @[simp] theorem coe_pi_add_coe_pi : (π : Real.Angle) + π = 0 := by rw [← two_nsmul, two_nsmul_coe_pi] #align real.angle.coe_pi_add_coe_pi Real.Angle.coe_pi_add_coe_pi theorem zsmul_eq_iff {ψ θ : Angle} {z : ℤ} (hz : z ≠ 0) : z • ψ = z • θ ↔ ∃ k : Fin z.natAbs, ψ = θ + (k : ℕ) • (2 * π / z : ℝ) := QuotientAddGroup.zmultiples_zsmul_eq_zsmul_iff hz #align real.angle.zsmul_eq_iff Real.Angle.zsmul_eq_iff theorem nsmul_eq_iff {ψ θ : Angle} {n : ℕ} (hz : n ≠ 0) : n • ψ = n • θ ↔ ∃ k : Fin n, ψ = θ + (k : ℕ) • (2 * π / n : ℝ) := QuotientAddGroup.zmultiples_nsmul_eq_nsmul_iff hz #align real.angle.nsmul_eq_iff Real.Angle.nsmul_eq_iff theorem two_zsmul_eq_iff {ψ θ : Angle} : (2 : ℤ) • ψ = (2 : ℤ) • θ ↔ ψ = θ ∨ ψ = θ + ↑π := by -- Porting note: no `Int.natAbs_bit0` anymore have : Int.natAbs 2 = 2 := rfl rw [zsmul_eq_iff two_ne_zero, this, Fin.exists_fin_two, Fin.val_zero, Fin.val_one, zero_smul, add_zero, one_smul, Int.cast_two, mul_div_cancel_left₀ (_ : ℝ) two_ne_zero] #align real.angle.two_zsmul_eq_iff Real.Angle.two_zsmul_eq_iff theorem two_nsmul_eq_iff {ψ θ : Angle} : (2 : ℕ) • ψ = (2 : ℕ) • θ ↔ ψ = θ ∨ ψ = θ + ↑π := by simp_rw [← natCast_zsmul, Nat.cast_ofNat, two_zsmul_eq_iff] #align real.angle.two_nsmul_eq_iff Real.Angle.two_nsmul_eq_iff theorem two_nsmul_eq_zero_iff {θ : Angle} : (2 : ℕ) • θ = 0 ↔ θ = 0 ∨ θ = π := by convert two_nsmul_eq_iff <;> simp #align real.angle.two_nsmul_eq_zero_iff Real.Angle.two_nsmul_eq_zero_iff theorem two_nsmul_ne_zero_iff {θ : Angle} : (2 : ℕ) • θ ≠ 0 ↔ θ ≠ 0 ∧ θ ≠ π := by rw [← not_or, ← two_nsmul_eq_zero_iff] #align real.angle.two_nsmul_ne_zero_iff Real.Angle.two_nsmul_ne_zero_iff theorem two_zsmul_eq_zero_iff {θ : Angle} : (2 : ℤ) • θ = 0 ↔ θ = 0 ∨ θ = π := by simp_rw [two_zsmul, ← two_nsmul, two_nsmul_eq_zero_iff] #align real.angle.two_zsmul_eq_zero_iff Real.Angle.two_zsmul_eq_zero_iff theorem two_zsmul_ne_zero_iff {θ : Angle} : (2 : ℤ) • θ ≠ 0 ↔ θ ≠ 0 ∧ θ ≠ π := by rw [← not_or, ← two_zsmul_eq_zero_iff] #align real.angle.two_zsmul_ne_zero_iff Real.Angle.two_zsmul_ne_zero_iff theorem eq_neg_self_iff {θ : Angle} : θ = -θ ↔ θ = 0 ∨ θ = π := by rw [← add_eq_zero_iff_eq_neg, ← two_nsmul, two_nsmul_eq_zero_iff] #align real.angle.eq_neg_self_iff Real.Angle.eq_neg_self_iff theorem ne_neg_self_iff {θ : Angle} : θ ≠ -θ ↔ θ ≠ 0 ∧ θ ≠ π := by rw [← not_or, ← eq_neg_self_iff.not] #align real.angle.ne_neg_self_iff Real.Angle.ne_neg_self_iff theorem neg_eq_self_iff {θ : Angle} : -θ = θ ↔ θ = 0 ∨ θ = π := by rw [eq_comm, eq_neg_self_iff] #align real.angle.neg_eq_self_iff Real.Angle.neg_eq_self_iff theorem neg_ne_self_iff {θ : Angle} : -θ ≠ θ ↔ θ ≠ 0 ∧ θ ≠ π := by rw [← not_or, ← neg_eq_self_iff.not] #align real.angle.neg_ne_self_iff Real.Angle.neg_ne_self_iff theorem two_nsmul_eq_pi_iff {θ : Angle} : (2 : ℕ) • θ = π ↔ θ = (π / 2 : ℝ) ∨ θ = (-π / 2 : ℝ) := by have h : (π : Angle) = ((2 : ℕ) • (π / 2 : ℝ) :) := by rw [two_nsmul, add_halves] nth_rw 1 [h] rw [coe_nsmul, two_nsmul_eq_iff] -- Porting note: `congr` didn't simplify the goal of iff of `Or`s convert Iff.rfl rw [add_comm, ← coe_add, ← sub_eq_zero, ← coe_sub, neg_div, ← neg_sub, sub_neg_eq_add, add_assoc, add_halves, ← two_mul, coe_neg, coe_two_pi, neg_zero] #align real.angle.two_nsmul_eq_pi_iff Real.Angle.two_nsmul_eq_pi_iff theorem two_zsmul_eq_pi_iff {θ : Angle} : (2 : ℤ) • θ = π ↔ θ = (π / 2 : ℝ) ∨ θ = (-π / 2 : ℝ) := by rw [two_zsmul, ← two_nsmul, two_nsmul_eq_pi_iff] #align real.angle.two_zsmul_eq_pi_iff Real.Angle.two_zsmul_eq_pi_iff theorem cos_eq_iff_coe_eq_or_eq_neg {θ ψ : ℝ} : cos θ = cos ψ ↔ (θ : Angle) = ψ ∨ (θ : Angle) = -ψ := by constructor · intro Hcos rw [← sub_eq_zero, cos_sub_cos, mul_eq_zero, mul_eq_zero, neg_eq_zero, eq_false (two_ne_zero' ℝ), false_or_iff, sin_eq_zero_iff, sin_eq_zero_iff] at Hcos rcases Hcos with (⟨n, hn⟩ \| ⟨n, hn⟩) · right rw [eq_div_iff_mul_eq (two_ne_zero' ℝ), ← sub_eq_iff_eq_add] at hn rw [← hn, coe_sub, eq_neg_iff_add_eq_zero, sub_add_cancel, mul_assoc, intCast_mul_eq_zsmul, mul_comm, coe_two_pi, zsmul_zero] · left rw [eq_div_iff_mul_eq (two_ne_zero' ℝ), eq_sub_iff_add_eq] at hn rw [← hn, coe_add, mul_assoc, intCast_mul_eq_zsmul, mul_comm, coe_two_pi, zsmul_zero, zero_add] · rw [angle_eq_iff_two_pi_dvd_sub, ← coe_neg, angle_eq_iff_two_pi_dvd_sub] rintro (⟨k, H⟩ \| ⟨k, H⟩) · rw [← sub_eq_zero, cos_sub_cos, H, mul_assoc 2 π k, mul_div_cancel_left₀ _ (two_ne_zero' ℝ), mul_comm π _, sin_int_mul_pi, mul_zero] rw [← sub_eq_zero, cos_sub_cos, ← sub_neg_eq_add, H, mul_assoc 2 π k, mul_div_cancel_left₀ _ (two_ne_zero' ℝ), mul_comm π _, sin_int_mul_pi, mul_zero, zero_mul] #align real.angle.cos_eq_iff_coe_eq_or_eq_neg Real.Angle.cos_eq_iff_coe_eq_or_eq_neg theorem sin_eq_iff_coe_eq_or_add_eq_pi {θ ψ : ℝ} : sin θ = sin ψ ↔ (θ : Angle) = ψ ∨ (θ : Angle) + ψ = π := by constructor · intro Hsin rw [← cos_pi_div_two_sub, ← cos_pi_div_two_sub] at Hsin cases' cos_eq_iff_coe_eq_or_eq_neg.mp Hsin with h h · left rw [coe_sub, coe_sub] at h exact sub_right_inj.1 h right rw [coe_sub, coe_sub, eq_neg_iff_add_eq_zero, add_sub, sub_add_eq_add_sub, ← coe_add, add_halves, sub_sub, sub_eq_zero] at h exact h.symm · rw [angle_eq_iff_two_pi_dvd_sub, ← eq_sub_iff_add_eq, ← coe_sub, angle_eq_iff_two_pi_dvd_sub] rintro (⟨k, H⟩ \| ⟨k, H⟩) · rw [← sub_eq_zero, sin_sub_sin, H, mul_assoc 2 π k, mul_div_cancel_left₀ _ (two_ne_zero' ℝ), mul_comm π _, sin_int_mul_pi, mul_zero, zero_mul] have H' : θ + ψ = 2 * k * π + π := by rwa [← sub_add, sub_add_eq_add_sub, sub_eq_iff_eq_add, mul_assoc, mul_comm π _, ← mul_assoc] at H rw [← sub_eq_zero, sin_sub_sin, H', add_div, mul_assoc 2 _ π, mul_div_cancel_left₀ _ (two_ne_zero' ℝ), cos_add_pi_div_two, sin_int_mul_pi, neg_zero, mul_zero] #align real.angle.sin_eq_iff_coe_eq_or_add_eq_pi Real.Angle.sin_eq_iff_coe_eq_or_add_eq_pi theorem cos_sin_inj {θ ψ : ℝ} (Hcos : cos θ = cos ψ) (Hsin : sin θ = sin ψ) : (θ : Angle) = ψ := by cases' cos_eq_iff_coe_eq_or_eq_neg.mp Hcos with hc hc; · exact hc cases' sin_eq_iff_coe_eq_or_add_eq_pi.mp Hsin with hs hs; · exact hs rw [eq_neg_iff_add_eq_zero, hs] at hc obtain ⟨n, hn⟩ : ∃ n, n • _ = _ := QuotientAddGroup.leftRel_apply.mp (Quotient.exact' hc) rw [← neg_one_mul, add_zero, ← sub_eq_zero, zsmul_eq_mul, ← mul_assoc, ← sub_mul, mul_eq_zero, eq_false (ne_of_gt pi_pos), or_false_iff, sub_neg_eq_add, ← Int.cast_zero, ← Int.cast_one, ← Int.cast_ofNat, ← Int.cast_mul, ← Int.cast_add, Int.cast_inj] at hn have : (n * 2 + 1) % (2 : ℤ) = 0 % (2 : ℤ) := congr_arg (· % (2 : ℤ)) hn rw [add_comm, Int.add_mul_emod_self] at this exact absurd this one_ne_zero #align real.angle.cos_sin_inj Real.Angle.cos_sin_inj def sin (θ : Angle) : ℝ := sin_periodic.lift θ #align real.angle.sin Real.Angle.sin @[simp] theorem sin_coe (x : ℝ) : sin (x : Angle) = Real.sin x := rfl #align real.angle.sin_coe Real.Angle.sin_coe @[continuity] theorem continuous_sin : Continuous sin := Real.continuous_sin.quotient_liftOn' _ #align real.angle.continuous_sin Real.Angle.continuous_sin def cos (θ : Angle) : ℝ := cos_periodic.lift θ #align real.angle.cos Real.Angle.cos @[simp] theorem cos_coe (x : ℝ) : cos (x : Angle) = Real.cos x := rfl #align real.angle.cos_coe Real.Angle.cos_coe @[continuity] theorem continuous_cos : Continuous cos := Real.continuous_cos.quotient_liftOn' _ #align real.angle.continuous_cos Real.Angle.continuous_cos theorem cos_eq_real_cos_iff_eq_or_eq_neg {θ : Angle} {ψ : ℝ} : cos θ = Real.cos ψ ↔ θ = ψ ∨ θ = -ψ := by induction θ using Real.Angle.induction_on exact cos_eq_iff_coe_eq_or_eq_neg #align real.angle.cos_eq_real_cos_iff_eq_or_eq_neg Real.Angle.cos_eq_real_cos_iff_eq_or_eq_neg theorem cos_eq_iff_eq_or_eq_neg {θ ψ : Angle} : cos θ = cos ψ ↔ θ = ψ ∨ θ = -ψ := by induction ψ using Real.Angle.induction_on exact cos_eq_real_cos_iff_eq_or_eq_neg #align real.angle.cos_eq_iff_eq_or_eq_neg Real.Angle.cos_eq_iff_eq_or_eq_neg theorem sin_eq_real_sin_iff_eq_or_add_eq_pi {θ : Angle} {ψ : ℝ} : sin θ = Real.sin ψ ↔ θ = ψ ∨ θ + ψ = π := by induction θ using Real.Angle.induction_on exact sin_eq_iff_coe_eq_or_add_eq_pi #align real.angle.sin_eq_real_sin_iff_eq_or_add_eq_pi Real.Angle.sin_eq_real_sin_iff_eq_or_add_eq_pi theorem sin_eq_iff_eq_or_add_eq_pi {θ ψ : Angle} : sin θ = sin ψ ↔ θ = ψ ∨ θ + ψ = π := by induction ψ using Real.Angle.induction_on exact sin_eq_real_sin_iff_eq_or_add_eq_pi #align real.angle.sin_eq_iff_eq_or_add_eq_pi Real.Angle.sin_eq_iff_eq_or_add_eq_pi @[simp] theorem sin_zero : sin (0 : Angle) = 0 := by rw [← coe_zero, sin_coe, Real.sin_zero] #align real.angle.sin_zero Real.Angle.sin_zero -- Porting note (#10618): @[simp] can prove it theorem sin_coe_pi : sin (π : Angle) = 0 := by rw [sin_coe, Real.sin_pi] #align real.angle.sin_coe_pi Real.Angle.sin_coe_pi theorem sin_eq_zero_iff {θ : Angle} : sin θ = 0 ↔ θ = 0 ∨ θ = π := by nth_rw 1 [← sin_zero] rw [sin_eq_iff_eq_or_add_eq_pi] simp #align real.angle.sin_eq_zero_iff Real.Angle.sin_eq_zero_iff theorem sin_ne_zero_iff {θ : Angle} : sin θ ≠ 0 ↔ θ ≠ 0 ∧ θ ≠ π := by rw [← not_or, ← sin_eq_zero_iff] #align real.angle.sin_ne_zero_iff Real.Angle.sin_ne_zero_iff @[simp] theorem sin_neg (θ : Angle) : sin (-θ) = -sin θ := by induction θ using Real.Angle.induction_on exact Real.sin_neg _ #align real.angle.sin_neg Real.Angle.sin_neg theorem sin_antiperiodic : Function.Antiperiodic sin (π : Angle) := by intro θ induction θ using Real.Angle.induction_on exact Real.sin_antiperiodic _ #align real.angle.sin_antiperiodic Real.Angle.sin_antiperiodic @[simp] theorem sin_add_pi (θ : Angle) : sin (θ + π) = -sin θ := sin_antiperiodic θ #align real.angle.sin_add_pi Real.Angle.sin_add_pi @[simp] theorem sin_sub_pi (θ : Angle) : sin (θ - π) = -sin θ := sin_antiperiodic.sub_eq θ #align real.angle.sin_sub_pi Real.Angle.sin_sub_pi @[simp] theorem cos_zero : cos (0 : Angle) = 1 := by rw [← coe_zero, cos_coe, Real.cos_zero] #align real.angle.cos_zero Real.Angle.cos_zero -- Porting note (#10618): @[simp] can prove it theorem cos_coe_pi : cos (π : Angle) = -1 := by rw [cos_coe, Real.cos_pi] #align real.angle.cos_coe_pi Real.Angle.cos_coe_pi @[simp] theorem cos_neg (θ : Angle) : cos (-θ) = cos θ := by induction θ using Real.Angle.induction_on exact Real.cos_neg _ #align real.angle.cos_neg Real.Angle.cos_neg theorem cos_antiperiodic : Function.Antiperiodic cos (π : Angle) := by intro θ induction θ using Real.Angle.induction_on exact Real.cos_antiperiodic _ #align real.angle.cos_antiperiodic Real.Angle.cos_antiperiodic @[simp] theorem cos_add_pi (θ : Angle) : cos (θ + π) = -cos θ := cos_antiperiodic θ #align real.angle.cos_add_pi Real.Angle.cos_add_pi @[simp] theorem cos_sub_pi (θ : Angle) : cos (θ - π) = -cos θ := cos_antiperiodic.sub_eq θ #align real.angle.cos_sub_pi Real.Angle.cos_sub_pi theorem cos_eq_zero_iff {θ : Angle} : cos θ = 0 ↔ θ = (π / 2 : ℝ) ∨ θ = (-π / 2 : ℝ) := by rw [← cos_pi_div_two, ← cos_coe, cos_eq_iff_eq_or_eq_neg, ← coe_neg, ← neg_div] #align real.angle.cos_eq_zero_iff Real.Angle.cos_eq_zero_iff theorem sin_add (θ₁ θ₂ : Real.Angle) : sin (θ₁ + θ₂) = sin θ₁ * cos θ₂ + cos θ₁ * sin θ₂ := by induction θ₁ using Real.Angle.induction_on induction θ₂ using Real.Angle.induction_on exact Real.sin_add _ _ #align real.angle.sin_add Real.Angle.sin_add theorem cos_add (θ₁ θ₂ : Real.Angle) : cos (θ₁ + θ₂) = cos θ₁ * cos θ₂ - sin θ₁ * sin θ₂ := by induction θ₂ using Real.Angle.induction_on induction θ₁ using Real.Angle.induction_on exact Real.cos_add _ _ #align real.angle.cos_add Real.Angle.cos_add @[simp] theorem cos_sq_add_sin_sq (θ : Real.Angle) : cos θ ^ 2 + sin θ ^ 2 = 1 := by induction θ using Real.Angle.induction_on exact Real.cos_sq_add_sin_sq _ #align real.angle.cos_sq_add_sin_sq Real.Angle.cos_sq_add_sin_sq theorem sin_add_pi_div_two (θ : Angle) : sin (θ + ↑(π / 2)) = cos θ := by induction θ using Real.Angle.induction_on exact Real.sin_add_pi_div_two _ #align real.angle.sin_add_pi_div_two Real.Angle.sin_add_pi_div_two theorem sin_sub_pi_div_two (θ : Angle) : sin (θ - ↑(π / 2)) = -cos θ := by induction θ using Real.Angle.induction_on exact Real.sin_sub_pi_div_two _ #align real.angle.sin_sub_pi_div_two Real.Angle.sin_sub_pi_div_two theorem sin_pi_div_two_sub (θ : Angle) : sin (↑(π / 2) - θ) = cos θ := by induction θ using Real.Angle.induction_on exact Real.sin_pi_div_two_sub _ #align real.angle.sin_pi_div_two_sub Real.Angle.sin_pi_div_two_sub theorem cos_add_pi_div_two (θ : Angle) : cos (θ + ↑(π / 2)) = -sin θ := by induction θ using Real.Angle.induction_on exact Real.cos_add_pi_div_two _ #align real.angle.cos_add_pi_div_two Real.Angle.cos_add_pi_div_two theorem cos_sub_pi_div_two (θ : Angle) : cos (θ - ↑(π / 2)) = sin θ := by induction θ using Real.Angle.induction_on exact Real.cos_sub_pi_div_two _ #align real.angle.cos_sub_pi_div_two Real.Angle.cos_sub_pi_div_two theorem cos_pi_div_two_sub (θ : Angle) : cos (↑(π / 2) - θ) = sin θ := by induction θ using Real.Angle.induction_on exact Real.cos_pi_div_two_sub _ #align real.angle.cos_pi_div_two_sub Real.Angle.cos_pi_div_two_sub theorem abs_sin_eq_of_two_nsmul_eq {θ ψ : Angle} (h : (2 : ℕ) • θ = (2 : ℕ) • ψ) : \|sin θ\| = \|sin ψ\| := by rw [two_nsmul_eq_iff] at h rcases h with (rfl \| rfl) · rfl · rw [sin_add_pi, abs_neg] #align real.angle.abs_sin_eq_of_two_nsmul_eq Real.Angle.abs_sin_eq_of_two_nsmul_eq theorem abs_sin_eq_of_two_zsmul_eq {θ ψ : Angle} (h : (2 : ℤ) • θ = (2 : ℤ) • ψ) : \|sin θ\| = \|sin ψ\| := by simp_rw [two_zsmul, ← two_nsmul] at h exact abs_sin_eq_of_two_nsmul_eq h #align real.angle.abs_sin_eq_of_two_zsmul_eq Real.Angle.abs_sin_eq_of_two_zsmul_eq theorem abs_cos_eq_of_two_nsmul_eq {θ ψ : Angle} (h : (2 : ℕ) • θ = (2 : ℕ) • ψ) : \|cos θ\| = \|cos ψ\| := by rw [two_nsmul_eq_iff] at h rcases h with (rfl \| rfl) · rfl · rw [cos_add_pi, abs_neg] #align real.angle.abs_cos_eq_of_two_nsmul_eq Real.Angle.abs_cos_eq_of_two_nsmul_eq theorem abs_cos_eq_of_two_zsmul_eq {θ ψ : Angle} (h : (2 : ℤ) • θ = (2 : ℤ) • ψ) : \|cos θ\| = \|cos ψ\| := by simp_rw [two_zsmul, ← two_nsmul] at h exact abs_cos_eq_of_two_nsmul_eq h #align real.angle.abs_cos_eq_of_two_zsmul_eq Real.Angle.abs_cos_eq_of_two_zsmul_eq @[simp]	Mathlib/Analysis/SpecialFunctions/Trigonometric/Angle.lean	508	511	theorem coe_toIcoMod (θ ψ : ℝ) : ↑(toIcoMod two_pi_pos ψ θ) = (θ : Angle) := by	rw [angle_eq_iff_two_pi_dvd_sub] refine ⟨-toIcoDiv two_pi_pos ψ θ, ?_⟩ rw [toIcoMod_sub_self, zsmul_eq_mul, mul_comm]
import Mathlib.RepresentationTheory.FdRep import Mathlib.LinearAlgebra.Trace import Mathlib.RepresentationTheory.Invariants #align_import representation_theory.character from "leanprover-community/mathlib"@"55b3f8206b8596db8bb1804d8a92814a0b6670c9" noncomputable section universe u open CategoryTheory LinearMap CategoryTheory.MonoidalCategory Representation FiniteDimensional variable {k : Type u} [Field k] namespace FdRep set_option linter.uppercaseLean3 false -- `FdRep` section Group variable {G : Type u} [Group G] @[simp] theorem char_conj (V : FdRep k G) (g : G) (h : G) : V.character (h * g * h⁻¹) = V.character g := by rw [char_mul_comm, inv_mul_cancel_left] #align fdRep.char_conj FdRep.char_conj @[simp] theorem char_dual (V : FdRep k G) (g : G) : (of (dual V.ρ)).character g = V.character g⁻¹ := trace_transpose' (V.ρ g⁻¹) #align fdRep.char_dual FdRep.char_dual @[simp] theorem char_linHom (V W : FdRep k G) (g : G) : (of (linHom V.ρ W.ρ)).character g = V.character g⁻¹ * W.character g := by rw [← char_iso (dualTensorIsoLinHom _ _), char_tensor, Pi.mul_apply, char_dual] #align fdRep.char_lin_hom FdRep.char_linHom variable [Fintype G] [Invertible (Fintype.card G : k)]	Mathlib/RepresentationTheory/Character.lean	106	109	theorem average_char_eq_finrank_invariants (V : FdRep k G) : ⅟ (Fintype.card G : k) • ∑ g : G, V.character g = finrank k (invariants V.ρ) := by	erw [← (isProj_averageMap V.ρ).trace] -- Porting note: Changed `rw` to `erw` simp [character, GroupAlgebra.average, _root_.map_sum]
import Mathlib.CategoryTheory.Bicategory.Basic import Mathlib.CategoryTheory.Monoidal.Mon_ import Mathlib.CategoryTheory.Limits.Preserves.Shapes.Equalizers #align_import category_theory.monoidal.Bimod from "leanprover-community/mathlib"@"4698e35ca56a0d4fa53aa5639c3364e0a77f4eba" universe v₁ v₂ u₁ u₂ open CategoryTheory open CategoryTheory.MonoidalCategory variable {C : Type u₁} [Category.{v₁} C] [MonoidalCategory.{v₁} C] section open CategoryTheory.Limits variable [HasCoequalizers C] section variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)] theorem id_tensor_π_preserves_coequalizer_inv_desc {W X Y Z : C} (f g : X ⟶ Y) (h : Z ⊗ Y ⟶ W) (wh : (Z ◁ f) ≫ h = (Z ◁ g) ≫ h) : (Z ◁ coequalizer.π f g) ≫ (PreservesCoequalizer.iso (tensorLeft Z) f g).inv ≫ coequalizer.desc h wh = h := map_π_preserves_coequalizer_inv_desc (tensorLeft Z) f g h wh #align id_tensor_π_preserves_coequalizer_inv_desc id_tensor_π_preserves_coequalizer_inv_desc theorem id_tensor_π_preserves_coequalizer_inv_colimMap_desc {X Y Z X' Y' Z' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : Z ⊗ X ⟶ X') (q : Z ⊗ Y ⟶ Y') (wf : (Z ◁ f) ≫ q = p ≫ f') (wg : (Z ◁ g) ≫ q = p ≫ g') (h : Y' ⟶ Z') (wh : f' ≫ h = g' ≫ h) : (Z ◁ coequalizer.π f g) ≫ (PreservesCoequalizer.iso (tensorLeft Z) f g).inv ≫ colimMap (parallelPairHom (Z ◁ f) (Z ◁ g) f' g' p q wf wg) ≫ coequalizer.desc h wh = q ≫ h := map_π_preserves_coequalizer_inv_colimMap_desc (tensorLeft Z) f g f' g' p q wf wg h wh #align id_tensor_π_preserves_coequalizer_inv_colim_map_desc id_tensor_π_preserves_coequalizer_inv_colimMap_desc end section variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorRight X)] theorem π_tensor_id_preserves_coequalizer_inv_desc {W X Y Z : C} (f g : X ⟶ Y) (h : Y ⊗ Z ⟶ W) (wh : (f ▷ Z) ≫ h = (g ▷ Z) ≫ h) : (coequalizer.π f g ▷ Z) ≫ (PreservesCoequalizer.iso (tensorRight Z) f g).inv ≫ coequalizer.desc h wh = h := map_π_preserves_coequalizer_inv_desc (tensorRight Z) f g h wh #align π_tensor_id_preserves_coequalizer_inv_desc π_tensor_id_preserves_coequalizer_inv_desc theorem π_tensor_id_preserves_coequalizer_inv_colimMap_desc {X Y Z X' Y' Z' : C} (f g : X ⟶ Y) (f' g' : X' ⟶ Y') (p : X ⊗ Z ⟶ X') (q : Y ⊗ Z ⟶ Y') (wf : (f ▷ Z) ≫ q = p ≫ f') (wg : (g ▷ Z) ≫ q = p ≫ g') (h : Y' ⟶ Z') (wh : f' ≫ h = g' ≫ h) : (coequalizer.π f g ▷ Z) ≫ (PreservesCoequalizer.iso (tensorRight Z) f g).inv ≫ colimMap (parallelPairHom (f ▷ Z) (g ▷ Z) f' g' p q wf wg) ≫ coequalizer.desc h wh = q ≫ h := map_π_preserves_coequalizer_inv_colimMap_desc (tensorRight Z) f g f' g' p q wf wg h wh #align π_tensor_id_preserves_coequalizer_inv_colim_map_desc π_tensor_id_preserves_coequalizer_inv_colimMap_desc end end structure Bimod (A B : Mon_ C) where X : C actLeft : A.X ⊗ X ⟶ X one_actLeft : (A.one ▷ X) ≫ actLeft = (λ_ X).hom := by aesop_cat left_assoc : (A.mul ▷ X) ≫ actLeft = (α_ A.X A.X X).hom ≫ (A.X ◁ actLeft) ≫ actLeft := by aesop_cat actRight : X ⊗ B.X ⟶ X actRight_one : (X ◁ B.one) ≫ actRight = (ρ_ X).hom := by aesop_cat right_assoc : (X ◁ B.mul) ≫ actRight = (α_ X B.X B.X).inv ≫ (actRight ▷ B.X) ≫ actRight := by aesop_cat middle_assoc : (actLeft ▷ B.X) ≫ actRight = (α_ A.X X B.X).hom ≫ (A.X ◁ actRight) ≫ actLeft := by aesop_cat set_option linter.uppercaseLean3 false in #align Bimod Bimod attribute [reassoc (attr := simp)] Bimod.one_actLeft Bimod.actRight_one Bimod.left_assoc Bimod.right_assoc Bimod.middle_assoc namespace Bimod variable {A B : Mon_ C} (M : Bimod A B) @[ext] structure Hom (M N : Bimod A B) where hom : M.X ⟶ N.X left_act_hom : M.actLeft ≫ hom = (A.X ◁ hom) ≫ N.actLeft := by aesop_cat right_act_hom : M.actRight ≫ hom = (hom ▷ B.X) ≫ N.actRight := by aesop_cat set_option linter.uppercaseLean3 false in #align Bimod.hom Bimod.Hom attribute [reassoc (attr := simp)] Hom.left_act_hom Hom.right_act_hom @[simps] def id' (M : Bimod A B) : Hom M M where hom := 𝟙 M.X set_option linter.uppercaseLean3 false in #align Bimod.id' Bimod.id' instance homInhabited (M : Bimod A B) : Inhabited (Hom M M) := ⟨id' M⟩ set_option linter.uppercaseLean3 false in #align Bimod.hom_inhabited Bimod.homInhabited @[simps] def comp {M N O : Bimod A B} (f : Hom M N) (g : Hom N O) : Hom M O where hom := f.hom ≫ g.hom set_option linter.uppercaseLean3 false in #align Bimod.comp Bimod.comp instance : Category (Bimod A B) where Hom M N := Hom M N id := id' comp f g := comp f g -- Porting note: added because `Hom.ext` is not triggered automatically @[ext] lemma hom_ext {M N : Bimod A B} (f g : M ⟶ N) (h : f.hom = g.hom) : f = g := Hom.ext _ _ h @[simp] theorem id_hom' (M : Bimod A B) : (𝟙 M : Hom M M).hom = 𝟙 M.X := rfl set_option linter.uppercaseLean3 false in #align Bimod.id_hom' Bimod.id_hom' @[simp] theorem comp_hom' {M N K : Bimod A B} (f : M ⟶ N) (g : N ⟶ K) : (f ≫ g : Hom M K).hom = f.hom ≫ g.hom := rfl set_option linter.uppercaseLean3 false in #align Bimod.comp_hom' Bimod.comp_hom' @[simps] def isoOfIso {X Y : Mon_ C} {P Q : Bimod X Y} (f : P.X ≅ Q.X) (f_left_act_hom : P.actLeft ≫ f.hom = (X.X ◁ f.hom) ≫ Q.actLeft) (f_right_act_hom : P.actRight ≫ f.hom = (f.hom ▷ Y.X) ≫ Q.actRight) : P ≅ Q where hom := { hom := f.hom } inv := { hom := f.inv left_act_hom := by rw [← cancel_mono f.hom, Category.assoc, Category.assoc, Iso.inv_hom_id, Category.comp_id, f_left_act_hom, ← Category.assoc, ← MonoidalCategory.whiskerLeft_comp, Iso.inv_hom_id, MonoidalCategory.whiskerLeft_id, Category.id_comp] right_act_hom := by rw [← cancel_mono f.hom, Category.assoc, Category.assoc, Iso.inv_hom_id, Category.comp_id, f_right_act_hom, ← Category.assoc, ← comp_whiskerRight, Iso.inv_hom_id, MonoidalCategory.id_whiskerRight, Category.id_comp] } hom_inv_id := by ext; dsimp; rw [Iso.hom_inv_id] inv_hom_id := by ext; dsimp; rw [Iso.inv_hom_id] set_option linter.uppercaseLean3 false in #align Bimod.iso_of_iso Bimod.isoOfIso variable (A) @[simps] def regular : Bimod A A where X := A.X actLeft := A.mul actRight := A.mul set_option linter.uppercaseLean3 false in #align Bimod.regular Bimod.regular instance : Inhabited (Bimod A A) := ⟨regular A⟩ def forget : Bimod A B ⥤ C where obj A := A.X map f := f.hom set_option linter.uppercaseLean3 false in #align Bimod.forget Bimod.forget open CategoryTheory.Limits variable [HasCoequalizers C] namespace TensorBimod variable {R S T : Mon_ C} (P : Bimod R S) (Q : Bimod S T) noncomputable def X : C := coequalizer (P.actRight ▷ Q.X) ((α_ _ _ _).hom ≫ (P.X ◁ Q.actLeft)) set_option linter.uppercaseLean3 false in #align Bimod.tensor_Bimod.X Bimod.TensorBimod.X section variable [∀ X : C, PreservesColimitsOfSize.{0, 0} (tensorLeft X)] noncomputable def actLeft : R.X ⊗ X P Q ⟶ X P Q := (PreservesCoequalizer.iso (tensorLeft R.X) _ _).inv ≫ colimMap (parallelPairHom _ _ _ _ ((α_ _ _ _).inv ≫ ((α_ _ _ _).inv ▷ _) ≫ (P.actLeft ▷ S.X ▷ Q.X)) ((α_ _ _ _).inv ≫ (P.actLeft ▷ Q.X)) (by dsimp simp only [Category.assoc] slice_lhs 1 2 => rw [associator_inv_naturality_middle] slice_rhs 3 4 => rw [← comp_whiskerRight, middle_assoc, comp_whiskerRight] coherence) (by dsimp slice_lhs 1 1 => rw [MonoidalCategory.whiskerLeft_comp] slice_lhs 2 3 => rw [associator_inv_naturality_right] slice_lhs 3 4 => rw [whisker_exchange] coherence)) set_option linter.uppercaseLean3 false in #align Bimod.tensor_Bimod.act_left Bimod.TensorBimod.actLeft theorem whiskerLeft_π_actLeft : (R.X ◁ coequalizer.π _ _) ≫ actLeft P Q = (α_ _ _ _).inv ≫ (P.actLeft ▷ Q.X) ≫ coequalizer.π _ _ := by erw [map_π_preserves_coequalizer_inv_colimMap (tensorLeft _)] simp only [Category.assoc] set_option linter.uppercaseLean3 false in #align Bimod.tensor_Bimod.id_tensor_π_act_left Bimod.TensorBimod.whiskerLeft_π_actLeft	Mathlib/CategoryTheory/Monoidal/Bimod.lean	250	259	theorem one_act_left' : (R.one ▷ _) ≫ actLeft P Q = (λ_ _).hom := by	refine (cancel_epi ((tensorLeft _).map (coequalizer.π _ _))).1 ?_ dsimp [X] -- Porting note: had to replace `rw` by `erw` slice_lhs 1 2 => erw [whisker_exchange] slice_lhs 2 3 => rw [whiskerLeft_π_actLeft] slice_lhs 1 2 => rw [associator_inv_naturality_left] slice_lhs 2 3 => rw [← comp_whiskerRight, one_actLeft] slice_rhs 1 2 => rw [leftUnitor_naturality] coherence
import Mathlib.MeasureTheory.OuterMeasure.Caratheodory #align_import measure_theory.measure.outer_measure from "leanprover-community/mathlib"@"343e80208d29d2d15f8050b929aa50fe4ce71b55" noncomputable section open Set Function Filter open scoped Classical NNReal Topology ENNReal namespace MeasureTheory open OuterMeasure section ExtendSet variable {α : Type} {P : Set α → Prop} variable {m : ∀ s : Set α, P s → ℝ≥0∞} variable (P0 : P ∅) (m0 : m ∅ P0 = 0) variable (PU : ∀ ⦃f : ℕ → Set α⦄ (_hm : ∀ i, P (f i)), P (⋃ i, f i)) variable (mU : ∀ ⦃f : ℕ → Set α⦄ (hm : ∀ i, P (f i)), Pairwise (Disjoint on f) → m (⋃ i, f i) (PU hm) = ∑' i, m (f i) (hm i)) variable (msU : ∀ ⦃f : ℕ → Set α⦄ (hm : ∀ i, P (f i)), m (⋃ i, f i) (PU hm) ≤ ∑' i, m (f i) (hm i)) variable (m_mono : ∀ ⦃s₁ s₂ : Set α⦄ (hs₁ : P s₁) (hs₂ : P s₂), s₁ ⊆ s₂ → m s₁ hs₁ ≤ m s₂ hs₂) theorem extend_empty : extend m ∅ = 0 := (extend_eq _ P0).trans m0 #align measure_theory.extend_empty MeasureTheory.extend_empty theorem extend_iUnion_nat {f : ℕ → Set α} (hm : ∀ i, P (f i)) (mU : m (⋃ i, f i) (PU hm) = ∑' i, m (f i) (hm i)) : extend m (⋃ i, f i) = ∑' i, extend m (f i) := (extend_eq _ _).trans <\| mU.trans <\| by congr with i rw [extend_eq] #align measure_theory.extend_Union_nat MeasureTheory.extend_iUnion_nat namespace OuterMeasure variable {α : Type} [MeasurableSpace α] (m : OuterMeasure α) def trim : OuterMeasure α := inducedOuterMeasure (fun s _ => m s) MeasurableSet.empty m.empty #align measure_theory.outer_measure.trim MeasureTheory.OuterMeasure.trim theorem le_trim_iff {m₁ m₂ : OuterMeasure α} : m₁ ≤ m₂.trim ↔ ∀ s, MeasurableSet s → m₁ s ≤ m₂ s := le_inducedOuterMeasure #align measure_theory.outer_measure.le_trim_iff MeasureTheory.OuterMeasure.le_trim_iff theorem le_trim : m ≤ m.trim := le_trim_iff.2 fun _ _ ↦ le_rfl #align measure_theory.outer_measure.le_trim MeasureTheory.OuterMeasure.le_trim @[simp] -- Porting note: added `simp` theorem trim_eq {s : Set α} (hs : MeasurableSet s) : m.trim s = m s := inducedOuterMeasure_eq' MeasurableSet.iUnion (fun f _hf => measure_iUnion_le f) (fun _ _ _ _ h => measure_mono h) hs #align measure_theory.outer_measure.trim_eq MeasureTheory.OuterMeasure.trim_eq theorem trim_congr {m₁ m₂ : OuterMeasure α} (H : ∀ {s : Set α}, MeasurableSet s → m₁ s = m₂ s) : m₁.trim = m₂.trim := by simp (config := { contextual := true }) only [trim, H] #align measure_theory.outer_measure.trim_congr MeasureTheory.OuterMeasure.trim_congr @[mono] theorem trim_mono : Monotone (trim : OuterMeasure α → OuterMeasure α) := fun _m₁ _m₂ H _s => iInf₂_mono fun _f _hs => ENNReal.tsum_le_tsum fun _b => iInf_mono fun _hf => H _ #align measure_theory.outer_measure.trim_mono MeasureTheory.OuterMeasure.trim_mono	Mathlib/MeasureTheory/OuterMeasure/Induced.lean	347	351	theorem trim_anti_measurableSpace (m : OuterMeasure α) {m0 m1 : MeasurableSpace α} (h : m0 ≤ m1) : @trim _ m1 m ≤ @trim _ m0 m := by	simp only [le_trim_iff] intro s hs rw [trim_eq _ (h s hs)]
import Mathlib.Algebra.BigOperators.Fin import Mathlib.LinearAlgebra.Finsupp import Mathlib.LinearAlgebra.Prod import Mathlib.SetTheory.Cardinal.Basic import Mathlib.Tactic.FinCases import Mathlib.Tactic.LinearCombination import Mathlib.Lean.Expr.ExtraRecognizers import Mathlib.Data.Set.Subsingleton #align_import linear_algebra.linear_independent from "leanprover-community/mathlib"@"9d684a893c52e1d6692a504a118bfccbae04feeb" noncomputable section open Function Set Submodule open Cardinal universe u' u variable {ι : Type u'} {ι' : Type} {R : Type} {K : Type} variable {M : Type} {M' M'' : Type} {V : Type u} {V' : Type} section Module variable {v : ι → M} variable [Semiring R] [AddCommMonoid M] [AddCommMonoid M'] [AddCommMonoid M''] variable [Module R M] [Module R M'] [Module R M''] variable {a b : R} {x y : M} variable (R) (v) def LinearIndependent : Prop := LinearMap.ker (Finsupp.total ι M R v) = ⊥ #align linear_independent LinearIndependent open Lean PrettyPrinter.Delaborator SubExpr in @[delab app.LinearIndependent] def delabLinearIndependent : Delab := whenPPOption getPPNotation <\| whenNotPPOption getPPAnalysisSkip <\| withOptionAtCurrPos `pp.analysis.skip true do let e ← getExpr guard <\| e.isAppOfArity ``LinearIndependent 7 let some _ := (e.getArg! 0).coeTypeSet? \| failure let optionsPerPos ← if (e.getArg! 3).isLambda then withNaryArg 3 do return (← read).optionsPerPos.setBool (← getPos) pp.funBinderTypes.name true else withNaryArg 0 do return (← read).optionsPerPos.setBool (← getPos) `pp.analysis.namedArg true withTheReader Context ({· with optionsPerPos}) delab variable {R} {v} theorem linearIndependent_iff : LinearIndependent R v ↔ ∀ l, Finsupp.total ι M R v l = 0 → l = 0 := by simp [LinearIndependent, LinearMap.ker_eq_bot'] #align linear_independent_iff linearIndependent_iff theorem linearIndependent_iff' : LinearIndependent R v ↔ ∀ s : Finset ι, ∀ g : ι → R, ∑ i ∈ s, g i • v i = 0 → ∀ i ∈ s, g i = 0 := linearIndependent_iff.trans ⟨fun hf s g hg i his => have h := hf (∑ i ∈ s, Finsupp.single i (g i)) <\| by simpa only [map_sum, Finsupp.total_single] using hg calc g i = (Finsupp.lapply i : (ι →₀ R) →ₗ[R] R) (Finsupp.single i (g i)) := by { rw [Finsupp.lapply_apply, Finsupp.single_eq_same] } _ = ∑ j ∈ s, (Finsupp.lapply i : (ι →₀ R) →ₗ[R] R) (Finsupp.single j (g j)) := Eq.symm <\| Finset.sum_eq_single i (fun j _hjs hji => by rw [Finsupp.lapply_apply, Finsupp.single_eq_of_ne hji]) fun hnis => hnis.elim his _ = (∑ j ∈ s, Finsupp.single j (g j)) i := (map_sum ..).symm _ = 0 := DFunLike.ext_iff.1 h i, fun hf l hl => Finsupp.ext fun i => _root_.by_contradiction fun hni => hni <\| hf _ _ hl _ <\| Finsupp.mem_support_iff.2 hni⟩ #align linear_independent_iff' linearIndependent_iff' theorem linearIndependent_iff'' : LinearIndependent R v ↔ ∀ (s : Finset ι) (g : ι → R), (∀ i ∉ s, g i = 0) → ∑ i ∈ s, g i • v i = 0 → ∀ i, g i = 0 := by classical exact linearIndependent_iff'.trans ⟨fun H s g hg hv i => if his : i ∈ s then H s g hv i his else hg i his, fun H s g hg i hi => by convert H s (fun j => if j ∈ s then g j else 0) (fun j hj => if_neg hj) (by simp_rw [ite_smul, zero_smul, Finset.sum_extend_by_zero, hg]) i exact (if_pos hi).symm⟩ #align linear_independent_iff'' linearIndependent_iff'' theorem not_linearIndependent_iff : ¬LinearIndependent R v ↔ ∃ s : Finset ι, ∃ g : ι → R, ∑ i ∈ s, g i • v i = 0 ∧ ∃ i ∈ s, g i ≠ 0 := by rw [linearIndependent_iff'] simp only [exists_prop, not_forall] #align not_linear_independent_iff not_linearIndependent_iff theorem Fintype.linearIndependent_iff [Fintype ι] : LinearIndependent R v ↔ ∀ g : ι → R, ∑ i, g i • v i = 0 → ∀ i, g i = 0 := by refine ⟨fun H g => by simpa using linearIndependent_iff'.1 H Finset.univ g, fun H => linearIndependent_iff''.2 fun s g hg hs i => H _ ?_ _⟩ rw [← hs] refine (Finset.sum_subset (Finset.subset_univ _) fun i _ hi => ?_).symm rw [hg i hi, zero_smul] #align fintype.linear_independent_iff Fintype.linearIndependent_iff theorem Fintype.linearIndependent_iff' [Fintype ι] [DecidableEq ι] : LinearIndependent R v ↔ LinearMap.ker (LinearMap.lsum R (fun _ ↦ R) ℕ fun i ↦ LinearMap.id.smulRight (v i)) = ⊥ := by simp [Fintype.linearIndependent_iff, LinearMap.ker_eq_bot', funext_iff] #align fintype.linear_independent_iff' Fintype.linearIndependent_iff' theorem Fintype.not_linearIndependent_iff [Fintype ι] : ¬LinearIndependent R v ↔ ∃ g : ι → R, ∑ i, g i • v i = 0 ∧ ∃ i, g i ≠ 0 := by simpa using not_iff_not.2 Fintype.linearIndependent_iff #align fintype.not_linear_independent_iff Fintype.not_linearIndependent_iff theorem linearIndependent_empty_type [IsEmpty ι] : LinearIndependent R v := linearIndependent_iff.mpr fun v _hv => Subsingleton.elim v 0 #align linear_independent_empty_type linearIndependent_empty_type theorem LinearIndependent.ne_zero [Nontrivial R] (i : ι) (hv : LinearIndependent R v) : v i ≠ 0 := fun h => zero_ne_one' R <\| Eq.symm (by suffices (Finsupp.single i 1 : ι →₀ R) i = 0 by simpa rw [linearIndependent_iff.1 hv (Finsupp.single i 1)] · simp · simp [h]) #align linear_independent.ne_zero LinearIndependent.ne_zero lemma LinearIndependent.eq_zero_of_pair {x y : M} (h : LinearIndependent R ![x, y]) {s t : R} (h' : s • x + t • y = 0) : s = 0 ∧ t = 0 := by have := linearIndependent_iff'.1 h Finset.univ ![s, t] simp only [Fin.sum_univ_two, Matrix.cons_val_zero, Matrix.cons_val_one, Matrix.head_cons, h', Finset.mem_univ, forall_true_left] at this exact ⟨this 0, this 1⟩ lemma LinearIndependent.pair_iff {x y : M} : LinearIndependent R ![x, y] ↔ ∀ (s t : R), s • x + t • y = 0 → s = 0 ∧ t = 0 := by refine ⟨fun h s t hst ↦ h.eq_zero_of_pair hst, fun h ↦ ?_⟩ apply Fintype.linearIndependent_iff.2 intro g hg simp only [Fin.sum_univ_two, Matrix.cons_val_zero, Matrix.cons_val_one, Matrix.head_cons] at hg intro i fin_cases i exacts [(h _ _ hg).1, (h _ _ hg).2] theorem LinearIndependent.comp (h : LinearIndependent R v) (f : ι' → ι) (hf : Injective f) : LinearIndependent R (v ∘ f) := by rw [linearIndependent_iff, Finsupp.total_comp] intro l hl have h_map_domain : ∀ x, (Finsupp.mapDomain f l) (f x) = 0 := by rw [linearIndependent_iff.1 h (Finsupp.mapDomain f l) hl]; simp ext x convert h_map_domain x rw [Finsupp.mapDomain_apply hf] #align linear_independent.comp LinearIndependent.comp theorem linearIndependent_iff_finset_linearIndependent : LinearIndependent R v ↔ ∀ (s : Finset ι), LinearIndependent R (v ∘ (Subtype.val : s → ι)) := ⟨fun H _ ↦ H.comp _ Subtype.val_injective, fun H ↦ linearIndependent_iff'.2 fun s g hg i hi ↦ Fintype.linearIndependent_iff.1 (H s) (g ∘ Subtype.val) (hg ▸ Finset.sum_attach s fun j ↦ g j • v j) ⟨i, hi⟩⟩ theorem LinearIndependent.coe_range (i : LinearIndependent R v) : LinearIndependent R ((↑) : range v → M) := by simpa using i.comp _ (rangeSplitting_injective v) #align linear_independent.coe_range LinearIndependent.coe_range theorem LinearIndependent.map (hv : LinearIndependent R v) {f : M →ₗ[R] M'} (hf_inj : Disjoint (span R (range v)) (LinearMap.ker f)) : LinearIndependent R (f ∘ v) := by rw [disjoint_iff_inf_le, ← Set.image_univ, Finsupp.span_image_eq_map_total, map_inf_eq_map_inf_comap, map_le_iff_le_comap, comap_bot, Finsupp.supported_univ, top_inf_eq] at hf_inj unfold LinearIndependent at hv ⊢ rw [hv, le_bot_iff] at hf_inj haveI : Inhabited M := ⟨0⟩ rw [Finsupp.total_comp, Finsupp.lmapDomain_total _ _ f, LinearMap.ker_comp, hf_inj] exact fun _ => rfl #align linear_independent.map LinearIndependent.map theorem Submodule.range_ker_disjoint {f : M →ₗ[R] M'} (hv : LinearIndependent R (f ∘ v)) : Disjoint (span R (range v)) (LinearMap.ker f) := by rw [LinearIndependent, Finsupp.total_comp, Finsupp.lmapDomain_total R _ f (fun _ ↦ rfl), LinearMap.ker_comp] at hv rw [disjoint_iff_inf_le, ← Set.image_univ, Finsupp.span_image_eq_map_total, map_inf_eq_map_inf_comap, hv, inf_bot_eq, map_bot] theorem LinearIndependent.map' (hv : LinearIndependent R v) (f : M →ₗ[R] M') (hf_inj : LinearMap.ker f = ⊥) : LinearIndependent R (f ∘ v) := hv.map <\| by simp [hf_inj] #align linear_independent.map' LinearIndependent.map' theorem LinearIndependent.map_of_injective_injective {R' : Type} {M' : Type} [Semiring R'] [AddCommMonoid M'] [Module R' M'] (hv : LinearIndependent R v) (i : R' → R) (j : M →+ M') (hi : ∀ r, i r = 0 → r = 0) (hj : ∀ m, j m = 0 → m = 0) (hc : ∀ (r : R') (m : M), j (i r • m) = r • j m) : LinearIndependent R' (j ∘ v) := by rw [linearIndependent_iff'] at hv ⊢ intro S r' H s hs simp_rw [comp_apply, ← hc, ← map_sum] at H exact hi _ <\| hv _ _ (hj _ H) s hs theorem LinearIndependent.map_of_surjective_injective {R' : Type} {M' : Type} [Semiring R'] [AddCommMonoid M'] [Module R' M'] (hv : LinearIndependent R v) (i : ZeroHom R R') (j : M →+ M') (hi : Surjective i) (hj : ∀ m, j m = 0 → m = 0) (hc : ∀ (r : R) (m : M), j (r • m) = i r • j m) : LinearIndependent R' (j ∘ v) := by obtain ⟨i', hi'⟩ := hi.hasRightInverse refine hv.map_of_injective_injective i' j (fun _ h ↦ ?_) hj fun r m ↦ ?_ · apply_fun i at h rwa [hi', i.map_zero] at h rw [hc (i' r) m, hi'] theorem LinearIndependent.of_comp (f : M →ₗ[R] M') (hfv : LinearIndependent R (f ∘ v)) : LinearIndependent R v := linearIndependent_iff'.2 fun s g hg i his => have : (∑ i ∈ s, g i • f (v i)) = 0 := by simp_rw [← map_smul, ← map_sum, hg, f.map_zero] linearIndependent_iff'.1 hfv s g this i his #align linear_independent.of_comp LinearIndependent.of_comp protected theorem LinearMap.linearIndependent_iff (f : M →ₗ[R] M') (hf_inj : LinearMap.ker f = ⊥) : LinearIndependent R (f ∘ v) ↔ LinearIndependent R v := ⟨fun h => h.of_comp f, fun h => h.map <\| by simp only [hf_inj, disjoint_bot_right]⟩ #align linear_map.linear_independent_iff LinearMap.linearIndependent_iff @[nontriviality] theorem linearIndependent_of_subsingleton [Subsingleton R] : LinearIndependent R v := linearIndependent_iff.2 fun _l _hl => Subsingleton.elim _ _ #align linear_independent_of_subsingleton linearIndependent_of_subsingleton theorem linearIndependent_equiv (e : ι ≃ ι') {f : ι' → M} : LinearIndependent R (f ∘ e) ↔ LinearIndependent R f := ⟨fun h => Function.comp_id f ▸ e.self_comp_symm ▸ h.comp _ e.symm.injective, fun h => h.comp _ e.injective⟩ #align linear_independent_equiv linearIndependent_equiv theorem linearIndependent_equiv' (e : ι ≃ ι') {f : ι' → M} {g : ι → M} (h : f ∘ e = g) : LinearIndependent R g ↔ LinearIndependent R f := h ▸ linearIndependent_equiv e #align linear_independent_equiv' linearIndependent_equiv' theorem linearIndependent_subtype_range {ι} {f : ι → M} (hf : Injective f) : LinearIndependent R ((↑) : range f → M) ↔ LinearIndependent R f := Iff.symm <\| linearIndependent_equiv' (Equiv.ofInjective f hf) rfl #align linear_independent_subtype_range linearIndependent_subtype_range alias ⟨LinearIndependent.of_subtype_range, _⟩ := linearIndependent_subtype_range #align linear_independent.of_subtype_range LinearIndependent.of_subtype_range theorem linearIndependent_image {ι} {s : Set ι} {f : ι → M} (hf : Set.InjOn f s) : (LinearIndependent R fun x : s => f x) ↔ LinearIndependent R fun x : f '' s => (x : M) := linearIndependent_equiv' (Equiv.Set.imageOfInjOn _ _ hf) rfl #align linear_independent_image linearIndependent_image theorem linearIndependent_span (hs : LinearIndependent R v) : LinearIndependent R (M := span R (range v)) (fun i : ι => ⟨v i, subset_span (mem_range_self i)⟩) := LinearIndependent.of_comp (span R (range v)).subtype hs #align linear_independent_span linearIndependent_span theorem LinearIndependent.fin_cons' {m : ℕ} (x : M) (v : Fin m → M) (hli : LinearIndependent R v) (x_ortho : ∀ (c : R) (y : Submodule.span R (Set.range v)), c • x + y = (0 : M) → c = 0) : LinearIndependent R (Fin.cons x v : Fin m.succ → M) := by rw [Fintype.linearIndependent_iff] at hli ⊢ rintro g total_eq j simp_rw [Fin.sum_univ_succ, Fin.cons_zero, Fin.cons_succ] at total_eq have : g 0 = 0 := by refine x_ortho (g 0) ⟨∑ i : Fin m, g i.succ • v i, ?_⟩ total_eq exact sum_mem fun i _ => smul_mem _ _ (subset_span ⟨i, rfl⟩) rw [this, zero_smul, zero_add] at total_eq exact Fin.cases this (hli _ total_eq) j #align linear_independent.fin_cons' LinearIndependent.fin_cons' theorem LinearIndependent.restrict_scalars [Semiring K] [SMulWithZero R K] [Module K M] [IsScalarTower R K M] (hinj : Function.Injective fun r : R => r • (1 : K)) (li : LinearIndependent K v) : LinearIndependent R v := by refine linearIndependent_iff'.mpr fun s g hg i hi => hinj ?_ dsimp only; rw [zero_smul] refine (linearIndependent_iff'.mp li : _) _ (g · • (1:K)) ?_ i hi simp_rw [smul_assoc, one_smul] exact hg #align linear_independent.restrict_scalars LinearIndependent.restrict_scalars theorem linearIndependent_finset_map_embedding_subtype (s : Set M) (li : LinearIndependent R ((↑) : s → M)) (t : Finset s) : LinearIndependent R ((↑) : Finset.map (Embedding.subtype s) t → M) := by let f : t.map (Embedding.subtype s) → s := fun x => ⟨x.1, by obtain ⟨x, h⟩ := x rw [Finset.mem_map] at h obtain ⟨a, _ha, rfl⟩ := h simp only [Subtype.coe_prop, Embedding.coe_subtype]⟩ convert LinearIndependent.comp li f ?_ rintro ⟨x, hx⟩ ⟨y, hy⟩ rw [Finset.mem_map] at hx hy obtain ⟨a, _ha, rfl⟩ := hx obtain ⟨b, _hb, rfl⟩ := hy simp only [f, imp_self, Subtype.mk_eq_mk] #align linear_independent_finset_map_embedding_subtype linearIndependent_finset_map_embedding_subtype theorem linearIndependent_bounded_of_finset_linearIndependent_bounded {n : ℕ} (H : ∀ s : Finset M, (LinearIndependent R fun i : s => (i : M)) → s.card ≤ n) : ∀ s : Set M, LinearIndependent R ((↑) : s → M) → #s ≤ n := by intro s li apply Cardinal.card_le_of intro t rw [← Finset.card_map (Embedding.subtype s)] apply H apply linearIndependent_finset_map_embedding_subtype _ li #align linear_independent_bounded_of_finset_linear_independent_bounded linearIndependent_bounded_of_finset_linearIndependent_bounded section Module variable {v : ι → M} variable [Ring R] [AddCommGroup M] [AddCommGroup M'] [AddCommGroup M''] variable [Module R M] [Module R M'] [Module R M''] variable {a b : R} {x y : M} theorem linearIndependent_iff_injective_total : LinearIndependent R v ↔ Function.Injective (Finsupp.total ι M R v) := linearIndependent_iff.trans (injective_iff_map_eq_zero (Finsupp.total ι M R v).toAddMonoidHom).symm #align linear_independent_iff_injective_total linearIndependent_iff_injective_total alias ⟨LinearIndependent.injective_total, _⟩ := linearIndependent_iff_injective_total #align linear_independent.injective_total LinearIndependent.injective_total theorem LinearIndependent.injective [Nontrivial R] (hv : LinearIndependent R v) : Injective v := by intro i j hij let l : ι →₀ R := Finsupp.single i (1 : R) - Finsupp.single j 1 have h_total : Finsupp.total ι M R v l = 0 := by simp_rw [l, LinearMap.map_sub, Finsupp.total_apply] simp [hij] have h_single_eq : Finsupp.single i (1 : R) = Finsupp.single j 1 := by rw [linearIndependent_iff] at hv simp [eq_add_of_sub_eq' (hv l h_total)] simpa [Finsupp.single_eq_single_iff] using h_single_eq #align linear_independent.injective LinearIndependent.injective theorem LinearIndependent.to_subtype_range {ι} {f : ι → M} (hf : LinearIndependent R f) : LinearIndependent R ((↑) : range f → M) := by nontriviality R exact (linearIndependent_subtype_range hf.injective).2 hf #align linear_independent.to_subtype_range LinearIndependent.to_subtype_range theorem LinearIndependent.to_subtype_range' {ι} {f : ι → M} (hf : LinearIndependent R f) {t} (ht : range f = t) : LinearIndependent R ((↑) : t → M) := ht ▸ hf.to_subtype_range #align linear_independent.to_subtype_range' LinearIndependent.to_subtype_range' theorem LinearIndependent.image_of_comp {ι ι'} (s : Set ι) (f : ι → ι') (g : ι' → M) (hs : LinearIndependent R fun x : s => g (f x)) : LinearIndependent R fun x : f '' s => g x := by nontriviality R have : InjOn f s := injOn_iff_injective.2 hs.injective.of_comp exact (linearIndependent_equiv' (Equiv.Set.imageOfInjOn f s this) rfl).1 hs #align linear_independent.image_of_comp LinearIndependent.image_of_comp theorem LinearIndependent.image {ι} {s : Set ι} {f : ι → M} (hs : LinearIndependent R fun x : s => f x) : LinearIndependent R fun x : f '' s => (x : M) := by convert LinearIndependent.image_of_comp s f id hs #align linear_independent.image LinearIndependent.image theorem LinearIndependent.group_smul {G : Type} [hG : Group G] [DistribMulAction G R] [DistribMulAction G M] [IsScalarTower G R M] [SMulCommClass G R M] {v : ι → M} (hv : LinearIndependent R v) (w : ι → G) : LinearIndependent R (w • v) := by rw [linearIndependent_iff''] at hv ⊢ intro s g hgs hsum i refine (smul_eq_zero_iff_eq (w i)).1 ?_ refine hv s (fun i => w i • g i) (fun i hi => ?_) ?_ i · dsimp only exact (hgs i hi).symm ▸ smul_zero _ · rw [← hsum, Finset.sum_congr rfl _] intros dsimp rw [smul_assoc, smul_comm] #align linear_independent.group_smul LinearIndependent.group_smul -- This lemma cannot be proved with `LinearIndependent.group_smul` since the action of -- `Rˣ` on `R` is not commutative. theorem LinearIndependent.units_smul {v : ι → M} (hv : LinearIndependent R v) (w : ι → Rˣ) : LinearIndependent R (w • v) := by rw [linearIndependent_iff''] at hv ⊢ intro s g hgs hsum i rw [← (w i).mul_left_eq_zero] refine hv s (fun i => g i • (w i : R)) (fun i hi => ?_) ?_ i · dsimp only exact (hgs i hi).symm ▸ zero_smul _ _ · rw [← hsum, Finset.sum_congr rfl _] intros erw [Pi.smul_apply, smul_assoc] rfl #align linear_independent.units_smul LinearIndependent.units_smul lemma LinearIndependent.eq_of_pair {x y : M} (h : LinearIndependent R ![x, y]) {s t s' t' : R} (h' : s • x + t • y = s' • x + t' • y) : s = s' ∧ t = t' := by have : (s - s') • x + (t - t') • y = 0 := by rw [← sub_eq_zero_of_eq h', ← sub_eq_zero] simp only [sub_smul] abel simpa [sub_eq_zero] using h.eq_zero_of_pair this lemma LinearIndependent.eq_zero_of_pair' {x y : M} (h : LinearIndependent R ![x, y]) {s t : R} (h' : s • x = t • y) : s = 0 ∧ t = 0 := by suffices H : s = 0 ∧ 0 = t from ⟨H.1, H.2.symm⟩ exact h.eq_of_pair (by simpa using h') lemma LinearIndependent.linear_combination_pair_of_det_ne_zero {R M : Type} [CommRing R] [NoZeroDivisors R] [AddCommGroup M] [Module R M] {x y : M} (h : LinearIndependent R ![x, y]) {a b c d : R} (h' : a * d - b * c ≠ 0) : LinearIndependent R ![a • x + b • y, c • x + d • y] := by apply LinearIndependent.pair_iff.2 (fun s t hst ↦ ?_) have H : (s * a + t * c) • x + (s * b + t * d) • y = 0 := by convert hst using 1 simp only [_root_.add_smul, smul_add, smul_smul] abel have I1 : s * a + t * c = 0 := (h.eq_zero_of_pair H).1 have I2 : s * b + t * d = 0 := (h.eq_zero_of_pair H).2 have J1 : (a * d - b * c) * s = 0 := by linear_combination d * I1 - c * I2 have J2 : (a * d - b * c) * t = 0 := by linear_combination -b * I1 + a * I2 exact ⟨by simpa [h'] using mul_eq_zero.1 J1, by simpa [h'] using mul_eq_zero.1 J2⟩ theorem surjective_of_linearIndependent_of_span [Nontrivial R] (hv : LinearIndependent R v) (f : ι' ↪ ι) (hss : range v ⊆ span R (range (v ∘ f))) : Surjective f := by intro i let repr : (span R (range (v ∘ f)) : Type _) → ι' →₀ R := (hv.comp f f.injective).repr let l := (repr ⟨v i, hss (mem_range_self i)⟩).mapDomain f have h_total_l : Finsupp.total ι M R v l = v i := by dsimp only [l] rw [Finsupp.total_mapDomain] rw [(hv.comp f f.injective).total_repr] -- Porting note: `rfl` isn't necessary. have h_total_eq : (Finsupp.total ι M R v) l = (Finsupp.total ι M R v) (Finsupp.single i 1) := by rw [h_total_l, Finsupp.total_single, one_smul] have l_eq : l = _ := LinearMap.ker_eq_bot.1 hv h_total_eq dsimp only [l] at l_eq rw [← Finsupp.embDomain_eq_mapDomain] at l_eq rcases Finsupp.single_of_embDomain_single (repr ⟨v i, _⟩) f i (1 : R) zero_ne_one.symm l_eq with ⟨i', hi'⟩ use i' exact hi'.2 #align surjective_of_linear_independent_of_span surjective_of_linearIndependent_of_span theorem eq_of_linearIndependent_of_span_subtype [Nontrivial R] {s t : Set M} (hs : LinearIndependent R (fun x => x : s → M)) (h : t ⊆ s) (hst : s ⊆ span R t) : s = t := by let f : t ↪ s := ⟨fun x => ⟨x.1, h x.2⟩, fun a b hab => Subtype.coe_injective (Subtype.mk.inj hab)⟩ have h_surj : Surjective f := by apply surjective_of_linearIndependent_of_span hs f _ convert hst <;> simp [f, comp] show s = t apply Subset.antisymm _ h intro x hx rcases h_surj ⟨x, hx⟩ with ⟨y, hy⟩ convert y.mem rw [← Subtype.mk.inj hy] #align eq_of_linear_independent_of_span_subtype eq_of_linearIndependent_of_span_subtype open LinearMap theorem LinearIndependent.image_subtype {s : Set M} {f : M →ₗ[R] M'} (hs : LinearIndependent R (fun x => x : s → M)) (hf_inj : Disjoint (span R s) (LinearMap.ker f)) : LinearIndependent R (fun x => x : f '' s → M') := by rw [← Subtype.range_coe (s := s)] at hf_inj refine (hs.map hf_inj).to_subtype_range' ?_ simp [Set.range_comp f] #align linear_independent.image_subtype LinearIndependent.image_subtype	Mathlib/LinearAlgebra/LinearIndependent.lean	1,101	1,108	theorem LinearIndependent.inl_union_inr {s : Set M} {t : Set M'} (hs : LinearIndependent R (fun x => x : s → M)) (ht : LinearIndependent R (fun x => x : t → M')) : LinearIndependent R (fun x => x : ↥(inl R M M' '' s ∪ inr R M M' '' t) → M × M') := by	refine (hs.image_subtype ?_).union (ht.image_subtype ?_) ?_ <;> [simp; simp; skip] -- Note: #8386 had to change `span_image` into `span_image _` simp only [span_image _] simp [disjoint_iff, prod_inf_prod]
import Batteries.Data.RBMap.Alter import Batteries.Data.List.Lemmas namespace Batteries namespace RBNode open RBColor attribute [simp] fold foldl foldr Any forM foldlM Ordered @[simp] theorem min?_reverse (t : RBNode α) : t.reverse.min? = t.max? := by unfold RBNode.max?; split <;> simp [RBNode.min?] unfold RBNode.min?; rw [min?.match_1.eq_3] · apply min?_reverse · simpa [reverse_eq_iff] @[simp] theorem max?_reverse (t : RBNode α) : t.reverse.max? = t.min? := by rw [← min?_reverse, reverse_reverse] @[simp] theorem mem_nil {x} : ¬x ∈ (.nil : RBNode α) := by simp [(·∈·), EMem] @[simp] theorem mem_node {y c a x b} : y ∈ (.node c a x b : RBNode α) ↔ y = x ∨ y ∈ a ∨ y ∈ b := by simp [(·∈·), EMem] theorem All_def {t : RBNode α} : t.All p ↔ ∀ x ∈ t, p x := by induction t <;> simp [or_imp, forall_and, ] theorem Any_def {t : RBNode α} : t.Any p ↔ ∃ x ∈ t, p x := by induction t <;> simp [or_and_right, exists_or, ] theorem memP_def : MemP cut t ↔ ∃ x ∈ t, cut x = .eq := Any_def theorem mem_def : Mem cmp x t ↔ ∃ y ∈ t, cmp x y = .eq := Any_def theorem mem_congr [@TransCmp α cmp] {t : RBNode α} (h : cmp x y = .eq) : Mem cmp x t ↔ Mem cmp y t := by simp [Mem, TransCmp.cmp_congr_left' h] theorem isOrdered_iff' [@TransCmp α cmp] {t : RBNode α} : isOrdered cmp t L R ↔ (∀ a ∈ L, t.All (cmpLT cmp a ·)) ∧ (∀ a ∈ R, t.All (cmpLT cmp · a)) ∧ (∀ a ∈ L, ∀ b ∈ R, cmpLT cmp a b) ∧ Ordered cmp t := by induction t generalizing L R with \| nil => simp [isOrdered]; split <;> simp [cmpLT_iff] next h => intro _ ha _ hb; cases h _ _ ha hb \| node _ l v r => simp [isOrdered, ] exact ⟨ fun ⟨⟨Ll, lv, Lv, ol⟩, ⟨vr, rR, vR, or⟩⟩ => ⟨ fun _ h => ⟨Lv _ h, Ll _ h, (Lv _ h).trans_l vr⟩, fun _ h => ⟨vR _ h, (vR _ h).trans_r lv, rR _ h⟩, fun _ hL _ hR => (Lv _ hL).trans (vR _ hR), lv, vr, ol, or⟩, fun ⟨hL, hR, _, lv, vr, ol, or⟩ => ⟨ ⟨fun _ h => (hL _ h).2.1, lv, fun _ h => (hL _ h).1, ol⟩, ⟨vr, fun _ h => (hR _ h).2.2, fun _ h => (hR _ h).1, or⟩⟩⟩ theorem isOrdered_iff [@TransCmp α cmp] {t : RBNode α} : isOrdered cmp t ↔ Ordered cmp t := by simp [isOrdered_iff'] instance (cmp) [@TransCmp α cmp] (t) : Decidable (Ordered cmp t) := decidable_of_iff _ isOrdered_iff class IsCut (cmp : α → α → Ordering) (cut : α → Ordering) : Prop where le_lt_trans [TransCmp cmp] : cmp x y ≠ .gt → cut x = .lt → cut y = .lt le_gt_trans [TransCmp cmp] : cmp x y ≠ .gt → cut y = .gt → cut x = .gt theorem IsCut.lt_trans [IsCut cmp cut] [TransCmp cmp] (H : cmp x y = .lt) : cut x = .lt → cut y = .lt := IsCut.le_lt_trans <\| TransCmp.gt_asymm <\| OrientedCmp.cmp_eq_gt.2 H theorem IsCut.gt_trans [IsCut cmp cut] [TransCmp cmp] (H : cmp x y = .lt) : cut y = .gt → cut x = .gt := IsCut.le_gt_trans <\| TransCmp.gt_asymm <\| OrientedCmp.cmp_eq_gt.2 H theorem IsCut.congr [IsCut cmp cut] [TransCmp cmp] (H : cmp x y = .eq) : cut x = cut y := by cases ey : cut y · exact IsCut.le_lt_trans (fun h => nomatch H.symm.trans <\| OrientedCmp.cmp_eq_gt.1 h) ey · cases ex : cut x · exact IsCut.le_lt_trans (fun h => nomatch H.symm.trans h) ex \|>.symm.trans ey · rfl · refine IsCut.le_gt_trans (cmp := cmp) (fun h => ?_) ex \|>.symm.trans ey cases H.symm.trans <\| OrientedCmp.cmp_eq_gt.1 h · exact IsCut.le_gt_trans (fun h => nomatch H.symm.trans h) ey instance (cmp cut) [@IsCut α cmp cut] : IsCut (flip cmp) (cut · \|>.swap) where le_lt_trans h₁ h₂ := by have : TransCmp cmp := inferInstanceAs (TransCmp (flip (flip cmp))) rw [IsCut.le_gt_trans (cmp := cmp) h₁ (Ordering.swap_inj.1 h₂)]; rfl le_gt_trans h₁ h₂ := by have : TransCmp cmp := inferInstanceAs (TransCmp (flip (flip cmp))) rw [IsCut.le_lt_trans (cmp := cmp) h₁ (Ordering.swap_inj.1 h₂)]; rfl class IsStrictCut (cmp : α → α → Ordering) (cut : α → Ordering) extends IsCut cmp cut : Prop where exact [TransCmp cmp] : cut x = .eq → cmp x y = cut y instance (cmp) (a : α) : IsStrictCut cmp (cmp a) where le_lt_trans h₁ h₂ := TransCmp.lt_le_trans h₂ h₁ le_gt_trans h₁ := Decidable.not_imp_not.1 (TransCmp.le_trans · h₁) exact h := (TransCmp.cmp_congr_left h).symm instance (cmp cut) [@IsStrictCut α cmp cut] : IsStrictCut (flip cmp) (cut · \|>.swap) where exact h := by have : TransCmp cmp := inferInstanceAs (TransCmp (flip (flip cmp))) rw [← IsStrictCut.exact (cmp := cmp) (Ordering.swap_inj.1 h), OrientedCmp.symm]; rfl theorem toStream_toList' {t : RBNode α} {s} : (t.toStream s).toList = t.toList ++ s.toList := by induction t generalizing s <;> simp [, toStream] @[simp] theorem toStream_toList {t : RBNode α} : t.toStream.toList = t.toList := by simp [toStream_toList'] theorem Stream.next?_toList {s : RBNode.Stream α} : (s.next?.map fun (a, b) => (a, b.toList)) = s.toList.next? := by cases s <;> simp [next?, toStream_toList'] theorem ordered_iff {t : RBNode α} : t.Ordered cmp ↔ t.toList.Pairwise (cmpLT cmp) := by induction t with \| nil => simp \| node c l v r ihl ihr => simp [, List.pairwise_append, Ordered, All_def, and_assoc, and_left_comm, and_comm, imp_and, forall_and] exact fun _ _ hl hr a ha b hb => (hl _ ha).trans (hr _ hb) theorem Ordered.toList_sorted {t : RBNode α} : t.Ordered cmp → t.toList.Pairwise (cmpLT cmp) := ordered_iff.1 theorem min?_mem {t : RBNode α} (h : t.min? = some a) : a ∈ t := by rw [min?_eq_toList_head?] at h rw [← mem_toList] revert h; cases toList t <;> rintro ⟨⟩; constructor theorem Ordered.min?_le {t : RBNode α} [TransCmp cmp] (ht : t.Ordered cmp) (h : t.min? = some a) (x) (hx : x ∈ t) : cmp a x ≠ .gt := by rw [min?_eq_toList_head?] at h rw [← mem_toList] at hx have := ht.toList_sorted revert h hx this; cases toList t <;> rintro ⟨⟩ (_ \| ⟨_, hx⟩) (_ \| ⟨h1,h2⟩) · rw [OrientedCmp.cmp_refl (cmp := cmp)]; decide · rw [(h1 _ hx).1]; decide theorem max?_mem {t : RBNode α} (h : t.max? = some a) : a ∈ t := by simpa using min?_mem ((min?_reverse _).trans h) theorem Ordered.le_max? {t : RBNode α} [TransCmp cmp] (ht : t.Ordered cmp) (h : t.max? = some a) (x) (hx : x ∈ t) : cmp x a ≠ .gt := ht.reverse.min?_le ((min?_reverse _).trans h) _ (by simpa using hx) @[simp] theorem setBlack_toList {t : RBNode α} : t.setBlack.toList = t.toList := by cases t <;> simp [setBlack] @[simp] theorem setRed_toList {t : RBNode α} : t.setRed.toList = t.toList := by cases t <;> simp [setRed] @[simp] theorem balance1_toList {l : RBNode α} {v r} : (l.balance1 v r).toList = l.toList ++ v :: r.toList := by unfold balance1; split <;> simp @[simp] theorem balance2_toList {l : RBNode α} {v r} : (l.balance2 v r).toList = l.toList ++ v :: r.toList := by unfold balance2; split <;> simp @[simp] theorem balLeft_toList {l : RBNode α} {v r} : (l.balLeft v r).toList = l.toList ++ v :: r.toList := by unfold balLeft; split <;> (try simp); split <;> simp @[simp] theorem balRight_toList {l : RBNode α} {v r} : (l.balRight v r).toList = l.toList ++ v :: r.toList := by unfold balRight; split <;> (try simp); split <;> simp theorem size_eq {t : RBNode α} : t.size = t.toList.length := by induction t <;> simp [, size]; rfl @[simp] theorem reverse_size (t : RBNode α) : t.reverse.size = t.size := by simp [size_eq] @[simp] theorem Any_reverse {t : RBNode α} : t.reverse.Any p ↔ t.Any p := by simp [Any_def] @[simp] theorem memP_reverse {t : RBNode α} : MemP cut t.reverse ↔ MemP (cut · \|>.swap) t := by simp [MemP]; apply Iff.of_eq; congr; funext x; rw [← Ordering.swap_inj]; rfl theorem Mem_reverse [@OrientedCmp α cmp] {t : RBNode α} : Mem cmp x t.reverse ↔ Mem (flip cmp) x t := by simp [Mem]; apply Iff.of_eq; congr; funext x; rw [OrientedCmp.symm]; rfl open RBNode (IsCut IsStrictCut) namespace RBSet @[simp] theorem val_toList {t : RBSet α cmp} : t.1.toList = t.toList := rfl @[simp] theorem mkRBSet_eq : mkRBSet α cmp = ∅ := rfl @[simp] theorem empty_eq : @RBSet.empty α cmp = ∅ := rfl @[simp] theorem default_eq : (default : RBSet α cmp) = ∅ := rfl @[simp] theorem empty_toList : toList (∅ : RBSet α cmp) = [] := rfl @[simp] theorem single_toList : toList (single a : RBSet α cmp) = [a] := rfl theorem mem_toList {t : RBSet α cmp} : x ∈ toList t ↔ x ∈ t.1 := RBNode.mem_toList theorem mem_congr [@TransCmp α cmp] {t : RBSet α cmp} (h : cmp x y = .eq) : x ∈ t ↔ y ∈ t := RBNode.mem_congr h theorem mem_iff_mem_toList {t : RBSet α cmp} : x ∈ t ↔ ∃ y ∈ toList t, cmp x y = .eq := RBNode.mem_def.trans <\| by simp [mem_toList] theorem mem_of_mem_toList [@OrientedCmp α cmp] {t : RBSet α cmp} (h : x ∈ toList t) : x ∈ t := mem_iff_mem_toList.2 ⟨_, h, OrientedCmp.cmp_refl⟩ theorem foldl_eq_foldl_toList {t : RBSet α cmp} : t.foldl f init = t.toList.foldl f init := RBNode.foldl_eq_foldl_toList theorem foldr_eq_foldr_toList {t : RBSet α cmp} : t.foldr f init = t.toList.foldr f init := RBNode.foldr_eq_foldr_toList theorem foldlM_eq_foldlM_toList [Monad m] [LawfulMonad m] {t : RBSet α cmp} : t.foldlM (m := m) f init = t.toList.foldlM f init := RBNode.foldlM_eq_foldlM_toList theorem forM_eq_forM_toList [Monad m] [LawfulMonad m] {t : RBSet α cmp} : t.forM (m := m) f = t.toList.forM f := RBNode.forM_eq_forM_toList theorem forIn_eq_forIn_toList [Monad m] [LawfulMonad m] {t : RBSet α cmp} : forIn (m := m) t init f = forIn t.toList init f := RBNode.forIn_eq_forIn_toList theorem toStream_eq {t : RBSet α cmp} : toStream t = t.1.toStream .nil := rfl @[simp] theorem toStream_toList {t : RBSet α cmp} : (toStream t).toList = t.toList := by simp [toStream_eq] theorem isEmpty_iff_toList_eq_nil {t : RBSet α cmp} : t.isEmpty ↔ t.toList = [] := by obtain ⟨⟨⟩, _⟩ := t <;> simp [toList, isEmpty] theorem toList_sorted {t : RBSet α cmp} : t.toList.Pairwise (RBNode.cmpLT cmp) := t.2.out.1.toList_sorted theorem findP?_some_eq_eq {t : RBSet α cmp} : t.findP? cut = some y → cut y = .eq := RBNode.find?_some_eq_eq theorem find?_some_eq_eq {t : RBSet α cmp} : t.find? x = some y → cmp x y = .eq := findP?_some_eq_eq theorem findP?_some_mem_toList {t : RBSet α cmp} (h : t.findP? cut = some y) : y ∈ toList t := mem_toList.2 <\| RBNode.find?_some_mem h theorem find?_some_mem_toList {t : RBSet α cmp} (h : t.find? x = some y) : y ∈ toList t := findP?_some_mem_toList h theorem findP?_some_memP {t : RBSet α cmp} (h : t.findP? cut = some y) : t.MemP cut := RBNode.find?_some_memP h theorem find?_some_mem {t : RBSet α cmp} (h : t.find? x = some y) : x ∈ t := findP?_some_memP h theorem mem_toList_unique [@TransCmp α cmp] {t : RBSet α cmp} (hx : x ∈ toList t) (hy : y ∈ toList t) (e : cmp x y = .eq) : x = y := t.2.out.1.unique (mem_toList.1 hx) (mem_toList.1 hy) e theorem findP?_some [@TransCmp α cmp] [IsStrictCut cmp cut] {t : RBSet α cmp} : t.findP? cut = some y ↔ y ∈ toList t ∧ cut y = .eq := t.2.out.1.find?_some.trans <\| by simp [mem_toList] theorem find?_some [@TransCmp α cmp] {t : RBSet α cmp} : t.find? x = some y ↔ y ∈ toList t ∧ cmp x y = .eq := findP?_some theorem memP_iff_findP? [@TransCmp α cmp] [IsCut cmp cut] {t : RBSet α cmp} : MemP cut t ↔ ∃ y, t.findP? cut = some y := t.2.out.1.memP_iff_find? theorem mem_iff_find? [@TransCmp α cmp] {t : RBSet α cmp} : x ∈ t ↔ ∃ y, t.find? x = some y := memP_iff_findP? @[simp] theorem contains_iff [@TransCmp α cmp] {t : RBSet α cmp} : t.contains x ↔ x ∈ t := Option.isSome_iff_exists.trans mem_iff_find?.symm instance [@TransCmp α cmp] {t : RBSet α cmp} : Decidable (x ∈ t) := decidable_of_iff _ contains_iff theorem size_eq (t : RBSet α cmp) : t.size = t.toList.length := RBNode.size_eq theorem mem_toList_insert_self (v) (t : RBSet α cmp) : v ∈ toList (t.insert v) := let ⟨_, _, h⟩ := t.2.out.2; mem_toList.2 (RBNode.mem_insert_self h) theorem mem_insert_self [@OrientedCmp α cmp] (v) (t : RBSet α cmp) : v ∈ t.insert v := mem_of_mem_toList <\| mem_toList_insert_self v t theorem mem_insert_of_eq [@TransCmp α cmp] (t : RBSet α cmp) (h : cmp v v' = .eq) : v' ∈ t.insert v := (mem_congr h).1 (mem_insert_self ..) theorem mem_toList_insert_of_mem (v) {t : RBSet α cmp} (h : v' ∈ toList t) : v' ∈ toList (t.insert v) ∨ cmp v v' = .eq := let ⟨_, _, ht⟩ := t.2.out.2 .imp_left mem_toList.2 <\| RBNode.mem_insert_of_mem ht <\| mem_toList.1 h theorem mem_insert_of_mem_toList [@OrientedCmp α cmp] (v) {t : RBSet α cmp} (h : v' ∈ toList t) : v' ∈ t.insert v := match mem_toList_insert_of_mem v h with \| .inl h' => mem_of_mem_toList h' \| .inr h' => mem_iff_mem_toList.2 ⟨_, mem_toList_insert_self .., OrientedCmp.cmp_eq_eq_symm.1 h'⟩ theorem mem_insert_of_mem [@TransCmp α cmp] (v) {t : RBSet α cmp} (h : v' ∈ t) : v' ∈ t.insert v := let ⟨_, h₁, h₂⟩ := mem_iff_mem_toList.1 h (mem_congr h₂).2 (mem_insert_of_mem_toList v h₁) theorem mem_toList_insert [@TransCmp α cmp] {t : RBSet α cmp} : v' ∈ toList (t.insert v) ↔ (v' ∈ toList t ∧ t.find? v ≠ some v') ∨ v' = v := by let ⟨ht₁, _, _, ht₂⟩ := t.2.out simpa [mem_toList] using RBNode.mem_insert ht₂ ht₁	.lake/packages/batteries/Batteries/Data/RBMap/Lemmas.lean	940	946	theorem mem_insert [@TransCmp α cmp] {t : RBSet α cmp} : v' ∈ t.insert v ↔ v' ∈ t ∨ cmp v v' = .eq := by	refine ⟨fun h => ?_, fun \| .inl h => mem_insert_of_mem _ h \| .inr h => mem_insert_of_eq _ h⟩ let ⟨_, h₁, h₂⟩ := mem_iff_mem_toList.1 h match mem_toList_insert.1 h₁ with \| .inl ⟨h₃, _⟩ => exact .inl <\| mem_iff_mem_toList.2 ⟨_, h₃, h₂⟩ \| .inr rfl => exact .inr <\| OrientedCmp.cmp_eq_eq_symm.1 h₂
import Mathlib.Algebra.Algebra.Subalgebra.Directed import Mathlib.FieldTheory.IntermediateField import Mathlib.FieldTheory.Separable import Mathlib.FieldTheory.SplittingField.IsSplittingField import Mathlib.RingTheory.TensorProduct.Basic #align_import field_theory.adjoin from "leanprover-community/mathlib"@"df76f43357840485b9d04ed5dee5ab115d420e87" set_option autoImplicit true open FiniteDimensional Polynomial open scoped Classical Polynomial namespace IntermediateField section AdjoinDef variable (F : Type) [Field F] {E : Type} [Field E] [Algebra F E] (S : Set E) theorem adjoin_eq_range_algebraMap_adjoin : (adjoin F S : Set E) = Set.range (algebraMap (adjoin F S) E) := Subtype.range_coe.symm #align intermediate_field.adjoin_eq_range_algebra_map_adjoin IntermediateField.adjoin_eq_range_algebraMap_adjoin theorem adjoin.algebraMap_mem (x : F) : algebraMap F E x ∈ adjoin F S := IntermediateField.algebraMap_mem (adjoin F S) x #align intermediate_field.adjoin.algebra_map_mem IntermediateField.adjoin.algebraMap_mem theorem adjoin.range_algebraMap_subset : Set.range (algebraMap F E) ⊆ adjoin F S := by intro x hx cases' hx with f hf rw [← hf] exact adjoin.algebraMap_mem F S f #align intermediate_field.adjoin.range_algebra_map_subset IntermediateField.adjoin.range_algebraMap_subset instance adjoin.fieldCoe : CoeTC F (adjoin F S) where coe x := ⟨algebraMap F E x, adjoin.algebraMap_mem F S x⟩ #align intermediate_field.adjoin.field_coe IntermediateField.adjoin.fieldCoe theorem subset_adjoin : S ⊆ adjoin F S := fun _ hx => Subfield.subset_closure (Or.inr hx) #align intermediate_field.subset_adjoin IntermediateField.subset_adjoin instance adjoin.setCoe : CoeTC S (adjoin F S) where coe x := ⟨x, subset_adjoin F S (Subtype.mem x)⟩ #align intermediate_field.adjoin.set_coe IntermediateField.adjoin.setCoe @[mono] theorem adjoin.mono (T : Set E) (h : S ⊆ T) : adjoin F S ≤ adjoin F T := GaloisConnection.monotone_l gc h #align intermediate_field.adjoin.mono IntermediateField.adjoin.mono theorem adjoin_contains_field_as_subfield (F : Subfield E) : (F : Set E) ⊆ adjoin F S := fun x hx => adjoin.algebraMap_mem F S ⟨x, hx⟩ #align intermediate_field.adjoin_contains_field_as_subfield IntermediateField.adjoin_contains_field_as_subfield theorem subset_adjoin_of_subset_left {F : Subfield E} {T : Set E} (HT : T ⊆ F) : T ⊆ adjoin F S := fun x hx => (adjoin F S).algebraMap_mem ⟨x, HT hx⟩ #align intermediate_field.subset_adjoin_of_subset_left IntermediateField.subset_adjoin_of_subset_left theorem subset_adjoin_of_subset_right {T : Set E} (H : T ⊆ S) : T ⊆ adjoin F S := fun _ hx => subset_adjoin F S (H hx) #align intermediate_field.subset_adjoin_of_subset_right IntermediateField.subset_adjoin_of_subset_right @[simp] theorem adjoin_empty (F E : Type) [Field F] [Field E] [Algebra F E] : adjoin F (∅ : Set E) = ⊥ := eq_bot_iff.mpr (adjoin_le_iff.mpr (Set.empty_subset _)) #align intermediate_field.adjoin_empty IntermediateField.adjoin_empty @[simp] theorem adjoin_univ (F E : Type) [Field F] [Field E] [Algebra F E] : adjoin F (Set.univ : Set E) = ⊤ := eq_top_iff.mpr <\| subset_adjoin _ _ #align intermediate_field.adjoin_univ IntermediateField.adjoin_univ theorem adjoin_le_subfield {K : Subfield E} (HF : Set.range (algebraMap F E) ⊆ K) (HS : S ⊆ K) : (adjoin F S).toSubfield ≤ K := by apply Subfield.closure_le.mpr rw [Set.union_subset_iff] exact ⟨HF, HS⟩ #align intermediate_field.adjoin_le_subfield IntermediateField.adjoin_le_subfield theorem adjoin_subset_adjoin_iff {F' : Type} [Field F'] [Algebra F' E] {S S' : Set E} : (adjoin F S : Set E) ⊆ adjoin F' S' ↔ Set.range (algebraMap F E) ⊆ adjoin F' S' ∧ S ⊆ adjoin F' S' := ⟨fun h => ⟨(adjoin.range_algebraMap_subset _ _).trans h, (subset_adjoin _ _).trans h⟩, fun ⟨hF, hS⟩ => (Subfield.closure_le (t := (adjoin F' S').toSubfield)).mpr (Set.union_subset hF hS)⟩ #align intermediate_field.adjoin_subset_adjoin_iff IntermediateField.adjoin_subset_adjoin_iff theorem adjoin_adjoin_left (T : Set E) : (adjoin (adjoin F S) T).restrictScalars _ = adjoin F (S ∪ T) := by rw [SetLike.ext'_iff] change (↑(adjoin (adjoin F S) T) : Set E) = _ apply Set.eq_of_subset_of_subset <;> rw [adjoin_subset_adjoin_iff] <;> constructor · rintro _ ⟨⟨x, hx⟩, rfl⟩; exact adjoin.mono _ _ _ Set.subset_union_left hx · exact subset_adjoin_of_subset_right _ _ Set.subset_union_right -- Porting note: orginal proof times out · rintro x ⟨f, rfl⟩ refine Subfield.subset_closure ?_ left exact ⟨f, rfl⟩ -- Porting note: orginal proof times out · refine Set.union_subset (fun x hx => Subfield.subset_closure ?_) (fun x hx => Subfield.subset_closure ?_) · left refine ⟨⟨x, Subfield.subset_closure ?_⟩, rfl⟩ right exact hx · right exact hx #align intermediate_field.adjoin_adjoin_left IntermediateField.adjoin_adjoin_left @[simp] theorem adjoin_insert_adjoin (x : E) : adjoin F (insert x (adjoin F S : Set E)) = adjoin F (insert x S) := le_antisymm (adjoin_le_iff.mpr (Set.insert_subset_iff.mpr ⟨subset_adjoin _ _ (Set.mem_insert _ _), adjoin_le_iff.mpr (subset_adjoin_of_subset_right _ _ (Set.subset_insert _ _))⟩)) (adjoin.mono _ _ _ (Set.insert_subset_insert (subset_adjoin _ _))) #align intermediate_field.adjoin_insert_adjoin IntermediateField.adjoin_insert_adjoin theorem adjoin_adjoin_comm (T : Set E) : (adjoin (adjoin F S) T).restrictScalars F = (adjoin (adjoin F T) S).restrictScalars F := by rw [adjoin_adjoin_left, adjoin_adjoin_left, Set.union_comm] #align intermediate_field.adjoin_adjoin_comm IntermediateField.adjoin_adjoin_comm theorem adjoin_map {E' : Type} [Field E'] [Algebra F E'] (f : E →ₐ[F] E') : (adjoin F S).map f = adjoin F (f '' S) := by ext x show x ∈ (Subfield.closure (Set.range (algebraMap F E) ∪ S)).map (f : E →+* E') ↔ x ∈ Subfield.closure (Set.range (algebraMap F E') ∪ f '' S) rw [RingHom.map_field_closure, Set.image_union, ← Set.range_comp, ← RingHom.coe_comp, f.comp_algebraMap] rfl #align intermediate_field.adjoin_map IntermediateField.adjoin_map @[simp] theorem lift_adjoin (K : IntermediateField F E) (S : Set K) : lift (adjoin F S) = adjoin F (Subtype.val '' S) := adjoin_map _ _ _ theorem lift_adjoin_simple (K : IntermediateField F E) (α : K) : lift (adjoin F {α}) = adjoin F {α.1} := by simp only [lift_adjoin, Set.image_singleton] @[simp] theorem lift_bot (K : IntermediateField F E) : lift (F := K) ⊥ = ⊥ := map_bot _ @[simp] theorem lift_top (K : IntermediateField F E) : lift (F := K) ⊤ = K := by rw [lift, ← AlgHom.fieldRange_eq_map, fieldRange_val] @[simp] theorem adjoin_self (K : IntermediateField F E) : adjoin F K = K := le_antisymm (adjoin_le_iff.2 fun _ ↦ id) (subset_adjoin F _) theorem restrictScalars_adjoin (K : IntermediateField F E) (S : Set E) : restrictScalars F (adjoin K S) = adjoin F (K ∪ S) := by rw [← adjoin_self _ K, adjoin_adjoin_left, adjoin_self _ K] variable {F} in theorem extendScalars_adjoin {K : IntermediateField F E} {S : Set E} (h : K ≤ adjoin F S) : extendScalars h = adjoin K S := restrictScalars_injective F <\| by rw [extendScalars_restrictScalars, restrictScalars_adjoin] exact le_antisymm (adjoin.mono F S _ Set.subset_union_right) <\| adjoin_le_iff.2 <\| Set.union_subset h (subset_adjoin F S) variable {F} in theorem restrictScalars_adjoin_of_algEquiv {L L' : Type} [Field L] [Field L'] [Algebra F L] [Algebra L E] [Algebra F L'] [Algebra L' E] [IsScalarTower F L E] [IsScalarTower F L' E] (i : L ≃ₐ[F] L') (hi : algebraMap L E = (algebraMap L' E) ∘ i) (S : Set E) : (adjoin L S).restrictScalars F = (adjoin L' S).restrictScalars F := by apply_fun toSubfield using (fun K K' h ↦ by ext x; change x ∈ K.toSubfield ↔ x ∈ K'.toSubfield; rw [h]) change Subfield.closure _ = Subfield.closure _ congr ext x exact ⟨fun ⟨y, h⟩ ↦ ⟨i y, by rw [← h, hi]; rfl⟩, fun ⟨y, h⟩ ↦ ⟨i.symm y, by rw [← h, hi, Function.comp_apply, AlgEquiv.apply_symm_apply]⟩⟩ theorem algebra_adjoin_le_adjoin : Algebra.adjoin F S ≤ (adjoin F S).toSubalgebra := Algebra.adjoin_le (subset_adjoin _ _) #align intermediate_field.algebra_adjoin_le_adjoin IntermediateField.algebra_adjoin_le_adjoin theorem adjoin_eq_algebra_adjoin (inv_mem : ∀ x ∈ Algebra.adjoin F S, x⁻¹ ∈ Algebra.adjoin F S) : (adjoin F S).toSubalgebra = Algebra.adjoin F S := le_antisymm (show adjoin F S ≤ { Algebra.adjoin F S with inv_mem' := inv_mem } from adjoin_le_iff.mpr Algebra.subset_adjoin) (algebra_adjoin_le_adjoin _ _) #align intermediate_field.adjoin_eq_algebra_adjoin IntermediateField.adjoin_eq_algebra_adjoin theorem eq_adjoin_of_eq_algebra_adjoin (K : IntermediateField F E) (h : K.toSubalgebra = Algebra.adjoin F S) : K = adjoin F S := by apply toSubalgebra_injective rw [h] refine (adjoin_eq_algebra_adjoin F _ ?_).symm intro x convert K.inv_mem (x := x) <;> rw [← h] <;> rfl #align intermediate_field.eq_adjoin_of_eq_algebra_adjoin IntermediateField.eq_adjoin_of_eq_algebra_adjoin theorem adjoin_eq_top_of_algebra (hS : Algebra.adjoin F S = ⊤) : adjoin F S = ⊤ := top_le_iff.mp (hS.symm.trans_le <\| algebra_adjoin_le_adjoin F S) @[elab_as_elim] theorem adjoin_induction {s : Set E} {p : E → Prop} {x} (h : x ∈ adjoin F s) (mem : ∀ x ∈ s, p x) (algebraMap : ∀ x, p (algebraMap F E x)) (add : ∀ x y, p x → p y → p (x + y)) (neg : ∀ x, p x → p (-x)) (inv : ∀ x, p x → p x⁻¹) (mul : ∀ x y, p x → p y → p (x y)) : p x := Subfield.closure_induction h (fun x hx => Or.casesOn hx (fun ⟨x, hx⟩ => hx ▸ algebraMap x) (mem x)) ((_root_.algebraMap F E).map_one ▸ algebraMap 1) add neg inv mul #align intermediate_field.adjoin_induction IntermediateField.adjoin_induction open Lean in private partial def mkInsertTerm [Monad m] [MonadQuotation m] (xs : TSyntaxArray `term) : m Term := run 0 where run (i : Nat) : m Term := do if i + 1 == xs.size then ``(singleton $(xs[i]!)) else if i < xs.size then ``(insert $(xs[i]!) $(← run (i + 1))) else ``(EmptyCollection.emptyCollection) scoped macro:max K:term "⟮" xs:term,* "⟯" : term => do ``(adjoin $K $(← mkInsertTerm xs.getElems)) open Lean PrettyPrinter.Delaborator SubExpr in @[delab app.IntermediateField.adjoin] partial def delabAdjoinNotation : Delab := whenPPOption getPPNotation do let e ← getExpr guard <\| e.isAppOfArity ``adjoin 6 let F ← withNaryArg 0 delab let xs ← withNaryArg 5 delabInsertArray `($F⟮$(xs.toArray),⟯) where delabInsertArray : DelabM (List Term) := do let e ← getExpr if e.isAppOfArity ``EmptyCollection.emptyCollection 2 then return [] else if e.isAppOfArity ``singleton 4 then let x ← withNaryArg 3 delab return [x] else if e.isAppOfArity ``insert 5 then let x ← withNaryArg 3 delab let xs ← withNaryArg 4 delabInsertArray return x :: xs else failure section AdjoinSimple variable (α : E) -- Porting note: in all the theorems below, mathport translated `F⟮α⟯` into `F⟮⟯`. theorem mem_adjoin_simple_self : α ∈ F⟮α⟯ := subset_adjoin F {α} (Set.mem_singleton α) #align intermediate_field.mem_adjoin_simple_self IntermediateField.mem_adjoin_simple_self def AdjoinSimple.gen : F⟮α⟯ := ⟨α, mem_adjoin_simple_self F α⟩ #align intermediate_field.adjoin_simple.gen IntermediateField.AdjoinSimple.gen @[simp] theorem AdjoinSimple.coe_gen : (AdjoinSimple.gen F α : E) = α := rfl theorem AdjoinSimple.algebraMap_gen : algebraMap F⟮α⟯ E (AdjoinSimple.gen F α) = α := rfl #align intermediate_field.adjoin_simple.algebra_map_gen IntermediateField.AdjoinSimple.algebraMap_gen @[simp] theorem AdjoinSimple.isIntegral_gen : IsIntegral F (AdjoinSimple.gen F α) ↔ IsIntegral F α := by conv_rhs => rw [← AdjoinSimple.algebraMap_gen F α] rw [isIntegral_algebraMap_iff (algebraMap F⟮α⟯ E).injective] #align intermediate_field.adjoin_simple.is_integral_gen IntermediateField.AdjoinSimple.isIntegral_gen theorem adjoin_simple_adjoin_simple (β : E) : F⟮α⟯⟮β⟯.restrictScalars F = F⟮α, β⟯ := adjoin_adjoin_left _ _ _ #align intermediate_field.adjoin_simple_adjoin_simple IntermediateField.adjoin_simple_adjoin_simple theorem adjoin_simple_comm (β : E) : F⟮α⟯⟮β⟯.restrictScalars F = F⟮β⟯⟮α⟯.restrictScalars F := adjoin_adjoin_comm _ _ _ #align intermediate_field.adjoin_simple_comm IntermediateField.adjoin_simple_comm variable {F} {α} theorem adjoin_algebraic_toSubalgebra {S : Set E} (hS : ∀ x ∈ S, IsAlgebraic F x) : (IntermediateField.adjoin F S).toSubalgebra = Algebra.adjoin F S := by simp only [isAlgebraic_iff_isIntegral] at hS have : Algebra.IsIntegral F (Algebra.adjoin F S) := by rwa [← le_integralClosure_iff_isIntegral, Algebra.adjoin_le_iff] have : IsField (Algebra.adjoin F S) := isField_of_isIntegral_of_isField' (Field.toIsField F) rw [← ((Algebra.adjoin F S).toIntermediateField' this).eq_adjoin_of_eq_algebra_adjoin F S] <;> rfl #align intermediate_field.adjoin_algebraic_to_subalgebra IntermediateField.adjoin_algebraic_toSubalgebra theorem adjoin_simple_toSubalgebra_of_integral (hα : IsIntegral F α) : F⟮α⟯.toSubalgebra = Algebra.adjoin F {α} := by apply adjoin_algebraic_toSubalgebra rintro x (rfl : x = α) rwa [isAlgebraic_iff_isIntegral] #align intermediate_field.adjoin_simple_to_subalgebra_of_integral IntermediateField.adjoin_simple_toSubalgebra_of_integral theorem _root_.isSplittingField_iff_intermediateField {p : F[X]} : p.IsSplittingField F E ↔ p.Splits (algebraMap F E) ∧ adjoin F (p.rootSet E) = ⊤ := by rw [← toSubalgebra_injective.eq_iff, adjoin_algebraic_toSubalgebra fun _ ↦ isAlgebraic_of_mem_rootSet] exact ⟨fun ⟨spl, adj⟩ ↦ ⟨spl, adj⟩, fun ⟨spl, adj⟩ ↦ ⟨spl, adj⟩⟩ -- Note: p.Splits (algebraMap F E) also works theorem isSplittingField_iff {p : F[X]} {K : IntermediateField F E} : p.IsSplittingField F K ↔ p.Splits (algebraMap F K) ∧ K = adjoin F (p.rootSet E) := by suffices _ → (Algebra.adjoin F (p.rootSet K) = ⊤ ↔ K = adjoin F (p.rootSet E)) by exact ⟨fun h ↦ ⟨h.1, (this h.1).mp h.2⟩, fun h ↦ ⟨h.1, (this h.1).mpr h.2⟩⟩ rw [← toSubalgebra_injective.eq_iff, adjoin_algebraic_toSubalgebra fun x ↦ isAlgebraic_of_mem_rootSet] refine fun hp ↦ (adjoin_rootSet_eq_range hp K.val).symm.trans ?_ rw [← K.range_val, eq_comm] #align intermediate_field.is_splitting_field_iff IntermediateField.isSplittingField_iff theorem adjoin_rootSet_isSplittingField {p : F[X]} (hp : p.Splits (algebraMap F E)) : p.IsSplittingField F (adjoin F (p.rootSet E)) := isSplittingField_iff.mpr ⟨splits_of_splits hp fun _ hx ↦ subset_adjoin F (p.rootSet E) hx, rfl⟩ #align intermediate_field.adjoin_root_set_is_splitting_field IntermediateField.adjoin_rootSet_isSplittingField section AdjoinIntermediateFieldLattice variable {F : Type} [Field F] {E : Type*} [Field E] [Algebra F E] {α : E} {S : Set E} @[simp] theorem adjoin_eq_bot_iff : adjoin F S = ⊥ ↔ S ⊆ (⊥ : IntermediateField F E) := by rw [eq_bot_iff, adjoin_le_iff]; rfl #align intermediate_field.adjoin_eq_bot_iff IntermediateField.adjoin_eq_bot_iff theorem adjoin_simple_eq_bot_iff : F⟮α⟯ = ⊥ ↔ α ∈ (⊥ : IntermediateField F E) := by simp #align intermediate_field.adjoin_simple_eq_bot_iff IntermediateField.adjoin_simple_eq_bot_iff @[simp] theorem adjoin_zero : F⟮(0 : E)⟯ = ⊥ := adjoin_simple_eq_bot_iff.mpr (zero_mem ⊥) #align intermediate_field.adjoin_zero IntermediateField.adjoin_zero @[simp] theorem adjoin_one : F⟮(1 : E)⟯ = ⊥ := adjoin_simple_eq_bot_iff.mpr (one_mem ⊥) #align intermediate_field.adjoin_one IntermediateField.adjoin_one @[simp] theorem adjoin_intCast (n : ℤ) : F⟮(n : E)⟯ = ⊥ := by exact adjoin_simple_eq_bot_iff.mpr (intCast_mem ⊥ n) #align intermediate_field.adjoin_int IntermediateField.adjoin_intCast @[simp] theorem adjoin_natCast (n : ℕ) : F⟮(n : E)⟯ = ⊥ := adjoin_simple_eq_bot_iff.mpr (natCast_mem ⊥ n) #align intermediate_field.adjoin_nat IntermediateField.adjoin_natCast @[deprecated (since := "2024-04-05")] alias adjoin_int := adjoin_intCast @[deprecated (since := "2024-04-05")] alias adjoin_nat := adjoin_natCast section AdjoinRank open FiniteDimensional Module variable {K L : IntermediateField F E} @[simp]	Mathlib/FieldTheory/Adjoin.lean	968	970	theorem rank_eq_one_iff : Module.rank F K = 1 ↔ K = ⊥ := by	rw [← toSubalgebra_eq_iff, ← rank_eq_rank_subalgebra, Subalgebra.rank_eq_one_iff, bot_toSubalgebra]
import Mathlib.Algebra.GeomSum import Mathlib.Algebra.Order.Ring.Basic import Mathlib.Algebra.Ring.Int import Mathlib.NumberTheory.Padics.PadicVal import Mathlib.RingTheory.Ideal.Quotient #align_import number_theory.multiplicity from "leanprover-community/mathlib"@"e8638a0fcaf73e4500469f368ef9494e495099b3" open Ideal Ideal.Quotient Finset variable {R : Type*} {n : ℕ} section CommRing variable [CommRing R] {a b x y : R}	Mathlib/NumberTheory/Multiplicity.lean	39	43	theorem dvd_geom_sum₂_iff_of_dvd_sub {x y p : R} (h : p ∣ x - y) : (p ∣ ∑ i ∈ range n, x ^ i * y ^ (n - 1 - i)) ↔ p ∣ n * y ^ (n - 1) := by	rw [← mem_span_singleton, ← Ideal.Quotient.eq] at h simp only [← mem_span_singleton, ← eq_zero_iff_mem, RingHom.map_geom_sum₂, h, geom_sum₂_self, _root_.map_mul, map_pow, map_natCast]
import Mathlib.Order.Interval.Set.UnorderedInterval import Mathlib.Algebra.Order.Interval.Set.Monoid import Mathlib.Data.Set.Pointwise.Basic import Mathlib.Algebra.Order.Field.Basic import Mathlib.Algebra.Order.Group.MinMax #align_import data.set.pointwise.interval from "leanprover-community/mathlib"@"2196ab363eb097c008d4497125e0dde23fb36db2" open Interval Pointwise variable {α : Type} namespace Set section LinearOrderedField variable [LinearOrderedField α] {a : α} @[simp] theorem preimage_mul_const_Iio (a : α) {c : α} (h : 0 < c) : (fun x => x c) ⁻¹' Iio a = Iio (a / c) := ext fun _x => (lt_div_iff h).symm #align set.preimage_mul_const_Iio Set.preimage_mul_const_Iio @[simp] theorem preimage_mul_const_Ioi (a : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ioi a = Ioi (a / c) := ext fun _x => (div_lt_iff h).symm #align set.preimage_mul_const_Ioi Set.preimage_mul_const_Ioi @[simp] theorem preimage_mul_const_Iic (a : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Iic a = Iic (a / c) := ext fun _x => (le_div_iff h).symm #align set.preimage_mul_const_Iic Set.preimage_mul_const_Iic @[simp] theorem preimage_mul_const_Ici (a : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ici a = Ici (a / c) := ext fun _x => (div_le_iff h).symm #align set.preimage_mul_const_Ici Set.preimage_mul_const_Ici @[simp] theorem preimage_mul_const_Ioo (a b : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ioo a b = Ioo (a / c) (b / c) := by simp [← Ioi_inter_Iio, h] #align set.preimage_mul_const_Ioo Set.preimage_mul_const_Ioo @[simp] theorem preimage_mul_const_Ioc (a b : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ioc a b = Ioc (a / c) (b / c) := by simp [← Ioi_inter_Iic, h] #align set.preimage_mul_const_Ioc Set.preimage_mul_const_Ioc @[simp] theorem preimage_mul_const_Ico (a b : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Ico a b = Ico (a / c) (b / c) := by simp [← Ici_inter_Iio, h] #align set.preimage_mul_const_Ico Set.preimage_mul_const_Ico @[simp]	Mathlib/Data/Set/Pointwise/Interval.lean	634	635	theorem preimage_mul_const_Icc (a b : α) {c : α} (h : 0 < c) : (fun x => x * c) ⁻¹' Icc a b = Icc (a / c) (b / c) := by	simp [← Ici_inter_Iic, h]
import Mathlib.CategoryTheory.Limits.Shapes.WidePullbacks import Mathlib.CategoryTheory.Limits.Shapes.BinaryProducts #align_import category_theory.limits.shapes.pullbacks from "leanprover-community/mathlib"@"7316286ff2942aa14e540add9058c6b0aa1c8070" noncomputable section open CategoryTheory universe w v₁ v₂ v u u₂ namespace CategoryTheory.Limits -- attribute [local tidy] tactic.case_bash Porting note: no tidy, no local abbrev WalkingCospan : Type := WidePullbackShape WalkingPair #align category_theory.limits.walking_cospan CategoryTheory.Limits.WalkingCospan @[match_pattern] abbrev WalkingCospan.left : WalkingCospan := some WalkingPair.left #align category_theory.limits.walking_cospan.left CategoryTheory.Limits.WalkingCospan.left @[match_pattern] abbrev WalkingCospan.right : WalkingCospan := some WalkingPair.right #align category_theory.limits.walking_cospan.right CategoryTheory.Limits.WalkingCospan.right @[match_pattern] abbrev WalkingCospan.one : WalkingCospan := none #align category_theory.limits.walking_cospan.one CategoryTheory.Limits.WalkingCospan.one abbrev WalkingSpan : Type := WidePushoutShape WalkingPair #align category_theory.limits.walking_span CategoryTheory.Limits.WalkingSpan @[match_pattern] abbrev WalkingSpan.left : WalkingSpan := some WalkingPair.left #align category_theory.limits.walking_span.left CategoryTheory.Limits.WalkingSpan.left @[match_pattern] abbrev WalkingSpan.right : WalkingSpan := some WalkingPair.right #align category_theory.limits.walking_span.right CategoryTheory.Limits.WalkingSpan.right @[match_pattern] abbrev WalkingSpan.zero : WalkingSpan := none #align category_theory.limits.walking_span.zero CategoryTheory.Limits.WalkingSpan.zero open WalkingSpan.Hom WalkingCospan.Hom WidePullbackShape.Hom WidePushoutShape.Hom variable {C : Type u} [Category.{v} C] def WalkingCospan.ext {F : WalkingCospan ⥤ C} {s t : Cone F} (i : s.pt ≅ t.pt) (w₁ : s.π.app WalkingCospan.left = i.hom ≫ t.π.app WalkingCospan.left) (w₂ : s.π.app WalkingCospan.right = i.hom ≫ t.π.app WalkingCospan.right) : s ≅ t := by apply Cones.ext i _ rintro (⟨⟩ \| ⟨⟨⟩⟩) · have h₁ := s.π.naturality WalkingCospan.Hom.inl dsimp at h₁ simp only [Category.id_comp] at h₁ have h₂ := t.π.naturality WalkingCospan.Hom.inl dsimp at h₂ simp only [Category.id_comp] at h₂ simp_rw [h₂, ← Category.assoc, ← w₁, ← h₁] · exact w₁ · exact w₂ #align category_theory.limits.walking_cospan.ext CategoryTheory.Limits.WalkingCospan.ext def WalkingSpan.ext {F : WalkingSpan ⥤ C} {s t : Cocone F} (i : s.pt ≅ t.pt) (w₁ : s.ι.app WalkingCospan.left ≫ i.hom = t.ι.app WalkingCospan.left) (w₂ : s.ι.app WalkingCospan.right ≫ i.hom = t.ι.app WalkingCospan.right) : s ≅ t := by apply Cocones.ext i _ rintro (⟨⟩ \| ⟨⟨⟩⟩) · have h₁ := s.ι.naturality WalkingSpan.Hom.fst dsimp at h₁ simp only [Category.comp_id] at h₁ have h₂ := t.ι.naturality WalkingSpan.Hom.fst dsimp at h₂ simp only [Category.comp_id] at h₂ simp_rw [← h₁, Category.assoc, w₁, h₂] · exact w₁ · exact w₂ #align category_theory.limits.walking_span.ext CategoryTheory.Limits.WalkingSpan.ext def cospan {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) : WalkingCospan ⥤ C := WidePullbackShape.wideCospan Z (fun j => WalkingPair.casesOn j X Y) fun j => WalkingPair.casesOn j f g #align category_theory.limits.cospan CategoryTheory.Limits.cospan def span {X Y Z : C} (f : X ⟶ Y) (g : X ⟶ Z) : WalkingSpan ⥤ C := WidePushoutShape.wideSpan X (fun j => WalkingPair.casesOn j Y Z) fun j => WalkingPair.casesOn j f g #align category_theory.limits.span CategoryTheory.Limits.span @[simp] theorem cospan_left {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) : (cospan f g).obj WalkingCospan.left = X := rfl #align category_theory.limits.cospan_left CategoryTheory.Limits.cospan_left @[simp] theorem span_left {X Y Z : C} (f : X ⟶ Y) (g : X ⟶ Z) : (span f g).obj WalkingSpan.left = Y := rfl #align category_theory.limits.span_left CategoryTheory.Limits.span_left @[simp] theorem cospan_right {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) : (cospan f g).obj WalkingCospan.right = Y := rfl #align category_theory.limits.cospan_right CategoryTheory.Limits.cospan_right @[simp] theorem span_right {X Y Z : C} (f : X ⟶ Y) (g : X ⟶ Z) : (span f g).obj WalkingSpan.right = Z := rfl #align category_theory.limits.span_right CategoryTheory.Limits.span_right @[simp] theorem cospan_one {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) : (cospan f g).obj WalkingCospan.one = Z := rfl #align category_theory.limits.cospan_one CategoryTheory.Limits.cospan_one @[simp] theorem span_zero {X Y Z : C} (f : X ⟶ Y) (g : X ⟶ Z) : (span f g).obj WalkingSpan.zero = X := rfl #align category_theory.limits.span_zero CategoryTheory.Limits.span_zero @[simp] theorem cospan_map_inl {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) : (cospan f g).map WalkingCospan.Hom.inl = f := rfl #align category_theory.limits.cospan_map_inl CategoryTheory.Limits.cospan_map_inl @[simp] theorem span_map_fst {X Y Z : C} (f : X ⟶ Y) (g : X ⟶ Z) : (span f g).map WalkingSpan.Hom.fst = f := rfl #align category_theory.limits.span_map_fst CategoryTheory.Limits.span_map_fst @[simp] theorem cospan_map_inr {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) : (cospan f g).map WalkingCospan.Hom.inr = g := rfl #align category_theory.limits.cospan_map_inr CategoryTheory.Limits.cospan_map_inr @[simp] theorem span_map_snd {X Y Z : C} (f : X ⟶ Y) (g : X ⟶ Z) : (span f g).map WalkingSpan.Hom.snd = g := rfl #align category_theory.limits.span_map_snd CategoryTheory.Limits.span_map_snd theorem cospan_map_id {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) (w : WalkingCospan) : (cospan f g).map (WalkingCospan.Hom.id w) = 𝟙 _ := rfl #align category_theory.limits.cospan_map_id CategoryTheory.Limits.cospan_map_id theorem span_map_id {X Y Z : C} (f : X ⟶ Y) (g : X ⟶ Z) (w : WalkingSpan) : (span f g).map (WalkingSpan.Hom.id w) = 𝟙 _ := rfl #align category_theory.limits.span_map_id CategoryTheory.Limits.span_map_id -- @[simps (config := { rhsMd := semireducible })] Porting note: no semireducible @[simps!] def diagramIsoCospan (F : WalkingCospan ⥤ C) : F ≅ cospan (F.map inl) (F.map inr) := NatIso.ofComponents (fun j => eqToIso (by rcases j with (⟨⟩ \| ⟨⟨⟩⟩) <;> rfl)) (by rintro (⟨⟩ \| ⟨⟨⟩⟩) (⟨⟩ \| ⟨⟨⟩⟩) f <;> cases f <;> dsimp <;> simp) #align category_theory.limits.diagram_iso_cospan CategoryTheory.Limits.diagramIsoCospan -- @[simps (config := { rhsMd := semireducible })] Porting note: no semireducible @[simps!] def diagramIsoSpan (F : WalkingSpan ⥤ C) : F ≅ span (F.map fst) (F.map snd) := NatIso.ofComponents (fun j => eqToIso (by rcases j with (⟨⟩ \| ⟨⟨⟩⟩) <;> rfl)) (by rintro (⟨⟩ \| ⟨⟨⟩⟩) (⟨⟩ \| ⟨⟨⟩⟩) f <;> cases f <;> dsimp <;> simp) #align category_theory.limits.diagram_iso_span CategoryTheory.Limits.diagramIsoSpan variable {D : Type u₂} [Category.{v₂} D] def cospanCompIso (F : C ⥤ D) {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) : cospan f g ⋙ F ≅ cospan (F.map f) (F.map g) := NatIso.ofComponents (by rintro (⟨⟩ \| ⟨⟨⟩⟩) <;> exact Iso.refl _) (by rintro (⟨⟩ \| ⟨⟨⟩⟩) (⟨⟩ \| ⟨⟨⟩⟩) f <;> cases f <;> dsimp <;> simp) #align category_theory.limits.cospan_comp_iso CategoryTheory.Limits.cospanCompIso section variable (F : C ⥤ D) {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) @[simp] theorem cospanCompIso_app_left : (cospanCompIso F f g).app WalkingCospan.left = Iso.refl _ := rfl #align category_theory.limits.cospan_comp_iso_app_left CategoryTheory.Limits.cospanCompIso_app_left @[simp] theorem cospanCompIso_app_right : (cospanCompIso F f g).app WalkingCospan.right = Iso.refl _ := rfl #align category_theory.limits.cospan_comp_iso_app_right CategoryTheory.Limits.cospanCompIso_app_right @[simp] theorem cospanCompIso_app_one : (cospanCompIso F f g).app WalkingCospan.one = Iso.refl _ := rfl #align category_theory.limits.cospan_comp_iso_app_one CategoryTheory.Limits.cospanCompIso_app_one @[simp] theorem cospanCompIso_hom_app_left : (cospanCompIso F f g).hom.app WalkingCospan.left = 𝟙 _ := rfl #align category_theory.limits.cospan_comp_iso_hom_app_left CategoryTheory.Limits.cospanCompIso_hom_app_left @[simp] theorem cospanCompIso_hom_app_right : (cospanCompIso F f g).hom.app WalkingCospan.right = 𝟙 _ := rfl #align category_theory.limits.cospan_comp_iso_hom_app_right CategoryTheory.Limits.cospanCompIso_hom_app_right @[simp] theorem cospanCompIso_hom_app_one : (cospanCompIso F f g).hom.app WalkingCospan.one = 𝟙 _ := rfl #align category_theory.limits.cospan_comp_iso_hom_app_one CategoryTheory.Limits.cospanCompIso_hom_app_one @[simp] theorem cospanCompIso_inv_app_left : (cospanCompIso F f g).inv.app WalkingCospan.left = 𝟙 _ := rfl #align category_theory.limits.cospan_comp_iso_inv_app_left CategoryTheory.Limits.cospanCompIso_inv_app_left @[simp] theorem cospanCompIso_inv_app_right : (cospanCompIso F f g).inv.app WalkingCospan.right = 𝟙 _ := rfl #align category_theory.limits.cospan_comp_iso_inv_app_right CategoryTheory.Limits.cospanCompIso_inv_app_right @[simp] theorem cospanCompIso_inv_app_one : (cospanCompIso F f g).inv.app WalkingCospan.one = 𝟙 _ := rfl #align category_theory.limits.cospan_comp_iso_inv_app_one CategoryTheory.Limits.cospanCompIso_inv_app_one end def spanCompIso (F : C ⥤ D) {X Y Z : C} (f : X ⟶ Y) (g : X ⟶ Z) : span f g ⋙ F ≅ span (F.map f) (F.map g) := NatIso.ofComponents (by rintro (⟨⟩ \| ⟨⟨⟩⟩) <;> exact Iso.refl _) (by rintro (⟨⟩ \| ⟨⟨⟩⟩) (⟨⟩ \| ⟨⟨⟩⟩) f <;> cases f <;> dsimp <;> simp) #align category_theory.limits.span_comp_iso CategoryTheory.Limits.spanCompIso section variable (F : C ⥤ D) {X Y Z : C} (f : X ⟶ Y) (g : X ⟶ Z) @[simp] theorem spanCompIso_app_left : (spanCompIso F f g).app WalkingSpan.left = Iso.refl _ := rfl #align category_theory.limits.span_comp_iso_app_left CategoryTheory.Limits.spanCompIso_app_left @[simp] theorem spanCompIso_app_right : (spanCompIso F f g).app WalkingSpan.right = Iso.refl _ := rfl #align category_theory.limits.span_comp_iso_app_right CategoryTheory.Limits.spanCompIso_app_right @[simp] theorem spanCompIso_app_zero : (spanCompIso F f g).app WalkingSpan.zero = Iso.refl _ := rfl #align category_theory.limits.span_comp_iso_app_zero CategoryTheory.Limits.spanCompIso_app_zero @[simp] theorem spanCompIso_hom_app_left : (spanCompIso F f g).hom.app WalkingSpan.left = 𝟙 _ := rfl #align category_theory.limits.span_comp_iso_hom_app_left CategoryTheory.Limits.spanCompIso_hom_app_left @[simp] theorem spanCompIso_hom_app_right : (spanCompIso F f g).hom.app WalkingSpan.right = 𝟙 _ := rfl #align category_theory.limits.span_comp_iso_hom_app_right CategoryTheory.Limits.spanCompIso_hom_app_right @[simp] theorem spanCompIso_hom_app_zero : (spanCompIso F f g).hom.app WalkingSpan.zero = 𝟙 _ := rfl #align category_theory.limits.span_comp_iso_hom_app_zero CategoryTheory.Limits.spanCompIso_hom_app_zero @[simp] theorem spanCompIso_inv_app_left : (spanCompIso F f g).inv.app WalkingSpan.left = 𝟙 _ := rfl #align category_theory.limits.span_comp_iso_inv_app_left CategoryTheory.Limits.spanCompIso_inv_app_left @[simp] theorem spanCompIso_inv_app_right : (spanCompIso F f g).inv.app WalkingSpan.right = 𝟙 _ := rfl #align category_theory.limits.span_comp_iso_inv_app_right CategoryTheory.Limits.spanCompIso_inv_app_right @[simp] theorem spanCompIso_inv_app_zero : (spanCompIso F f g).inv.app WalkingSpan.zero = 𝟙 _ := rfl #align category_theory.limits.span_comp_iso_inv_app_zero CategoryTheory.Limits.spanCompIso_inv_app_zero end section variable {X Y Z X' Y' Z' : C} (iX : X ≅ X') (iY : Y ≅ Y') (iZ : Z ≅ Z') section variable {f : X ⟶ Z} {g : Y ⟶ Z} {f' : X' ⟶ Z'} {g' : Y' ⟶ Z'} def cospanExt (wf : iX.hom ≫ f' = f ≫ iZ.hom) (wg : iY.hom ≫ g' = g ≫ iZ.hom) : cospan f g ≅ cospan f' g' := NatIso.ofComponents (by rintro (⟨⟩ \| ⟨⟨⟩⟩); exacts [iZ, iX, iY]) (by rintro (⟨⟩ \| ⟨⟨⟩⟩) (⟨⟩ \| ⟨⟨⟩⟩) f <;> cases f <;> dsimp <;> simp [wf, wg]) #align category_theory.limits.cospan_ext CategoryTheory.Limits.cospanExt variable (wf : iX.hom ≫ f' = f ≫ iZ.hom) (wg : iY.hom ≫ g' = g ≫ iZ.hom) @[simp] theorem cospanExt_app_left : (cospanExt iX iY iZ wf wg).app WalkingCospan.left = iX := by dsimp [cospanExt] #align category_theory.limits.cospan_ext_app_left CategoryTheory.Limits.cospanExt_app_left @[simp] theorem cospanExt_app_right : (cospanExt iX iY iZ wf wg).app WalkingCospan.right = iY := by dsimp [cospanExt] #align category_theory.limits.cospan_ext_app_right CategoryTheory.Limits.cospanExt_app_right @[simp] theorem cospanExt_app_one : (cospanExt iX iY iZ wf wg).app WalkingCospan.one = iZ := by dsimp [cospanExt] #align category_theory.limits.cospan_ext_app_one CategoryTheory.Limits.cospanExt_app_one @[simp] theorem cospanExt_hom_app_left : (cospanExt iX iY iZ wf wg).hom.app WalkingCospan.left = iX.hom := by dsimp [cospanExt] #align category_theory.limits.cospan_ext_hom_app_left CategoryTheory.Limits.cospanExt_hom_app_left @[simp] theorem cospanExt_hom_app_right : (cospanExt iX iY iZ wf wg).hom.app WalkingCospan.right = iY.hom := by dsimp [cospanExt] #align category_theory.limits.cospan_ext_hom_app_right CategoryTheory.Limits.cospanExt_hom_app_right @[simp] theorem cospanExt_hom_app_one : (cospanExt iX iY iZ wf wg).hom.app WalkingCospan.one = iZ.hom := by dsimp [cospanExt] #align category_theory.limits.cospan_ext_hom_app_one CategoryTheory.Limits.cospanExt_hom_app_one @[simp] theorem cospanExt_inv_app_left : (cospanExt iX iY iZ wf wg).inv.app WalkingCospan.left = iX.inv := by dsimp [cospanExt] #align category_theory.limits.cospan_ext_inv_app_left CategoryTheory.Limits.cospanExt_inv_app_left @[simp] theorem cospanExt_inv_app_right : (cospanExt iX iY iZ wf wg).inv.app WalkingCospan.right = iY.inv := by dsimp [cospanExt] #align category_theory.limits.cospan_ext_inv_app_right CategoryTheory.Limits.cospanExt_inv_app_right @[simp] theorem cospanExt_inv_app_one : (cospanExt iX iY iZ wf wg).inv.app WalkingCospan.one = iZ.inv := by dsimp [cospanExt] #align category_theory.limits.cospan_ext_inv_app_one CategoryTheory.Limits.cospanExt_inv_app_one end section variable {f : X ⟶ Y} {g : X ⟶ Z} {f' : X' ⟶ Y'} {g' : X' ⟶ Z'} def spanExt (wf : iX.hom ≫ f' = f ≫ iY.hom) (wg : iX.hom ≫ g' = g ≫ iZ.hom) : span f g ≅ span f' g' := NatIso.ofComponents (by rintro (⟨⟩ \| ⟨⟨⟩⟩); exacts [iX, iY, iZ]) (by rintro (⟨⟩ \| ⟨⟨⟩⟩) (⟨⟩ \| ⟨⟨⟩⟩) f <;> cases f <;> dsimp <;> simp [wf, wg]) #align category_theory.limits.span_ext CategoryTheory.Limits.spanExt variable (wf : iX.hom ≫ f' = f ≫ iY.hom) (wg : iX.hom ≫ g' = g ≫ iZ.hom) @[simp] theorem spanExt_app_left : (spanExt iX iY iZ wf wg).app WalkingSpan.left = iY := by dsimp [spanExt] #align category_theory.limits.span_ext_app_left CategoryTheory.Limits.spanExt_app_left @[simp] theorem spanExt_app_right : (spanExt iX iY iZ wf wg).app WalkingSpan.right = iZ := by dsimp [spanExt] #align category_theory.limits.span_ext_app_right CategoryTheory.Limits.spanExt_app_right @[simp] theorem spanExt_app_one : (spanExt iX iY iZ wf wg).app WalkingSpan.zero = iX := by dsimp [spanExt] #align category_theory.limits.span_ext_app_one CategoryTheory.Limits.spanExt_app_one @[simp] theorem spanExt_hom_app_left : (spanExt iX iY iZ wf wg).hom.app WalkingSpan.left = iY.hom := by dsimp [spanExt] #align category_theory.limits.span_ext_hom_app_left CategoryTheory.Limits.spanExt_hom_app_left @[simp] theorem spanExt_hom_app_right : (spanExt iX iY iZ wf wg).hom.app WalkingSpan.right = iZ.hom := by dsimp [spanExt] #align category_theory.limits.span_ext_hom_app_right CategoryTheory.Limits.spanExt_hom_app_right @[simp] theorem spanExt_hom_app_zero : (spanExt iX iY iZ wf wg).hom.app WalkingSpan.zero = iX.hom := by dsimp [spanExt] #align category_theory.limits.span_ext_hom_app_zero CategoryTheory.Limits.spanExt_hom_app_zero @[simp] theorem spanExt_inv_app_left : (spanExt iX iY iZ wf wg).inv.app WalkingSpan.left = iY.inv := by dsimp [spanExt] #align category_theory.limits.span_ext_inv_app_left CategoryTheory.Limits.spanExt_inv_app_left @[simp] theorem spanExt_inv_app_right : (spanExt iX iY iZ wf wg).inv.app WalkingSpan.right = iZ.inv := by dsimp [spanExt] #align category_theory.limits.span_ext_inv_app_right CategoryTheory.Limits.spanExt_inv_app_right @[simp] theorem spanExt_inv_app_zero : (spanExt iX iY iZ wf wg).inv.app WalkingSpan.zero = iX.inv := by dsimp [spanExt] #align category_theory.limits.span_ext_inv_app_zero CategoryTheory.Limits.spanExt_inv_app_zero end end variable {W X Y Z : C} abbrev PullbackCone (f : X ⟶ Z) (g : Y ⟶ Z) := Cone (cospan f g) #align category_theory.limits.pullback_cone CategoryTheory.Limits.PullbackCone namespace PullbackCone variable {f : X ⟶ Z} {g : Y ⟶ Z} abbrev fst (t : PullbackCone f g) : t.pt ⟶ X := t.π.app WalkingCospan.left #align category_theory.limits.pullback_cone.fst CategoryTheory.Limits.PullbackCone.fst abbrev snd (t : PullbackCone f g) : t.pt ⟶ Y := t.π.app WalkingCospan.right #align category_theory.limits.pullback_cone.snd CategoryTheory.Limits.PullbackCone.snd @[simp] theorem π_app_left (c : PullbackCone f g) : c.π.app WalkingCospan.left = c.fst := rfl #align category_theory.limits.pullback_cone.π_app_left CategoryTheory.Limits.PullbackCone.π_app_left @[simp] theorem π_app_right (c : PullbackCone f g) : c.π.app WalkingCospan.right = c.snd := rfl #align category_theory.limits.pullback_cone.π_app_right CategoryTheory.Limits.PullbackCone.π_app_right @[simp] theorem condition_one (t : PullbackCone f g) : t.π.app WalkingCospan.one = t.fst ≫ f := by have w := t.π.naturality WalkingCospan.Hom.inl dsimp at w; simpa using w #align category_theory.limits.pullback_cone.condition_one CategoryTheory.Limits.PullbackCone.condition_one def isLimitAux (t : PullbackCone f g) (lift : ∀ s : PullbackCone f g, s.pt ⟶ t.pt) (fac_left : ∀ s : PullbackCone f g, lift s ≫ t.fst = s.fst) (fac_right : ∀ s : PullbackCone f g, lift s ≫ t.snd = s.snd) (uniq : ∀ (s : PullbackCone f g) (m : s.pt ⟶ t.pt) (_ : ∀ j : WalkingCospan, m ≫ t.π.app j = s.π.app j), m = lift s) : IsLimit t := { lift fac := fun s j => Option.casesOn j (by rw [← s.w inl, ← t.w inl, ← Category.assoc] congr exact fac_left s) fun j' => WalkingPair.casesOn j' (fac_left s) (fac_right s) uniq := uniq } #align category_theory.limits.pullback_cone.is_limit_aux CategoryTheory.Limits.PullbackCone.isLimitAux def isLimitAux' (t : PullbackCone f g) (create : ∀ s : PullbackCone f g, { l // l ≫ t.fst = s.fst ∧ l ≫ t.snd = s.snd ∧ ∀ {m}, m ≫ t.fst = s.fst → m ≫ t.snd = s.snd → m = l }) : Limits.IsLimit t := PullbackCone.isLimitAux t (fun s => (create s).1) (fun s => (create s).2.1) (fun s => (create s).2.2.1) fun s _ w => (create s).2.2.2 (w WalkingCospan.left) (w WalkingCospan.right) #align category_theory.limits.pullback_cone.is_limit_aux' CategoryTheory.Limits.PullbackCone.isLimitAux' @[simps] def mk {W : C} (fst : W ⟶ X) (snd : W ⟶ Y) (eq : fst ≫ f = snd ≫ g) : PullbackCone f g where pt := W π := { app := fun j => Option.casesOn j (fst ≫ f) fun j' => WalkingPair.casesOn j' fst snd naturality := by rintro (⟨⟩ \| ⟨⟨⟩⟩) (⟨⟩ \| ⟨⟨⟩⟩) j <;> cases j <;> dsimp <;> simp [eq] } #align category_theory.limits.pullback_cone.mk CategoryTheory.Limits.PullbackCone.mk @[simp] theorem mk_π_app_left {W : C} (fst : W ⟶ X) (snd : W ⟶ Y) (eq : fst ≫ f = snd ≫ g) : (mk fst snd eq).π.app WalkingCospan.left = fst := rfl #align category_theory.limits.pullback_cone.mk_π_app_left CategoryTheory.Limits.PullbackCone.mk_π_app_left @[simp] theorem mk_π_app_right {W : C} (fst : W ⟶ X) (snd : W ⟶ Y) (eq : fst ≫ f = snd ≫ g) : (mk fst snd eq).π.app WalkingCospan.right = snd := rfl #align category_theory.limits.pullback_cone.mk_π_app_right CategoryTheory.Limits.PullbackCone.mk_π_app_right @[simp] theorem mk_π_app_one {W : C} (fst : W ⟶ X) (snd : W ⟶ Y) (eq : fst ≫ f = snd ≫ g) : (mk fst snd eq).π.app WalkingCospan.one = fst ≫ f := rfl #align category_theory.limits.pullback_cone.mk_π_app_one CategoryTheory.Limits.PullbackCone.mk_π_app_one @[simp] theorem mk_fst {W : C} (fst : W ⟶ X) (snd : W ⟶ Y) (eq : fst ≫ f = snd ≫ g) : (mk fst snd eq).fst = fst := rfl #align category_theory.limits.pullback_cone.mk_fst CategoryTheory.Limits.PullbackCone.mk_fst @[simp] theorem mk_snd {W : C} (fst : W ⟶ X) (snd : W ⟶ Y) (eq : fst ≫ f = snd ≫ g) : (mk fst snd eq).snd = snd := rfl #align category_theory.limits.pullback_cone.mk_snd CategoryTheory.Limits.PullbackCone.mk_snd @[reassoc] theorem condition (t : PullbackCone f g) : fst t ≫ f = snd t ≫ g := (t.w inl).trans (t.w inr).symm #align category_theory.limits.pullback_cone.condition CategoryTheory.Limits.PullbackCone.condition theorem equalizer_ext (t : PullbackCone f g) {W : C} {k l : W ⟶ t.pt} (h₀ : k ≫ fst t = l ≫ fst t) (h₁ : k ≫ snd t = l ≫ snd t) : ∀ j : WalkingCospan, k ≫ t.π.app j = l ≫ t.π.app j \| some WalkingPair.left => h₀ \| some WalkingPair.right => h₁ \| none => by rw [← t.w inl, reassoc_of% h₀] #align category_theory.limits.pullback_cone.equalizer_ext CategoryTheory.Limits.PullbackCone.equalizer_ext theorem IsLimit.hom_ext {t : PullbackCone f g} (ht : IsLimit t) {W : C} {k l : W ⟶ t.pt} (h₀ : k ≫ fst t = l ≫ fst t) (h₁ : k ≫ snd t = l ≫ snd t) : k = l := ht.hom_ext <\| equalizer_ext _ h₀ h₁ #align category_theory.limits.pullback_cone.is_limit.hom_ext CategoryTheory.Limits.PullbackCone.IsLimit.hom_ext theorem mono_snd_of_is_pullback_of_mono {t : PullbackCone f g} (ht : IsLimit t) [Mono f] : Mono t.snd := by refine ⟨fun {W} h k i => IsLimit.hom_ext ht ?_ i⟩ rw [← cancel_mono f, Category.assoc, Category.assoc, condition] have := congrArg (· ≫ g) i; dsimp at this rwa [Category.assoc, Category.assoc] at this #align category_theory.limits.pullback_cone.mono_snd_of_is_pullback_of_mono CategoryTheory.Limits.PullbackCone.mono_snd_of_is_pullback_of_mono theorem mono_fst_of_is_pullback_of_mono {t : PullbackCone f g} (ht : IsLimit t) [Mono g] : Mono t.fst := by refine ⟨fun {W} h k i => IsLimit.hom_ext ht i ?_⟩ rw [← cancel_mono g, Category.assoc, Category.assoc, ← condition] have := congrArg (· ≫ f) i; dsimp at this rwa [Category.assoc, Category.assoc] at this #align category_theory.limits.pullback_cone.mono_fst_of_is_pullback_of_mono CategoryTheory.Limits.PullbackCone.mono_fst_of_is_pullback_of_mono def ext {s t : PullbackCone f g} (i : s.pt ≅ t.pt) (w₁ : s.fst = i.hom ≫ t.fst) (w₂ : s.snd = i.hom ≫ t.snd) : s ≅ t := WalkingCospan.ext i w₁ w₂ #align category_theory.limits.pullback_cone.ext CategoryTheory.Limits.PullbackCone.ext -- Porting note: `IsLimit.lift` and the two following simp lemmas were introduced to ease the port def IsLimit.lift {t : PullbackCone f g} (ht : IsLimit t) {W : C} (h : W ⟶ X) (k : W ⟶ Y) (w : h ≫ f = k ≫ g) : W ⟶ t.pt := ht.lift <\| PullbackCone.mk _ _ w @[reassoc (attr := simp)] lemma IsLimit.lift_fst {t : PullbackCone f g} (ht : IsLimit t) {W : C} (h : W ⟶ X) (k : W ⟶ Y) (w : h ≫ f = k ≫ g) : IsLimit.lift ht h k w ≫ fst t = h := ht.fac _ _ @[reassoc (attr := simp)] lemma IsLimit.lift_snd {t : PullbackCone f g} (ht : IsLimit t) {W : C} (h : W ⟶ X) (k : W ⟶ Y) (w : h ≫ f = k ≫ g) : IsLimit.lift ht h k w ≫ snd t = k := ht.fac _ _ def IsLimit.lift' {t : PullbackCone f g} (ht : IsLimit t) {W : C} (h : W ⟶ X) (k : W ⟶ Y) (w : h ≫ f = k ≫ g) : { l : W ⟶ t.pt // l ≫ fst t = h ∧ l ≫ snd t = k } := ⟨IsLimit.lift ht h k w, by simp⟩ #align category_theory.limits.pullback_cone.is_limit.lift' CategoryTheory.Limits.PullbackCone.IsLimit.lift' def IsLimit.mk {W : C} {fst : W ⟶ X} {snd : W ⟶ Y} (eq : fst ≫ f = snd ≫ g) (lift : ∀ s : PullbackCone f g, s.pt ⟶ W) (fac_left : ∀ s : PullbackCone f g, lift s ≫ fst = s.fst) (fac_right : ∀ s : PullbackCone f g, lift s ≫ snd = s.snd) (uniq : ∀ (s : PullbackCone f g) (m : s.pt ⟶ W) (_ : m ≫ fst = s.fst) (_ : m ≫ snd = s.snd), m = lift s) : IsLimit (mk fst snd eq) := isLimitAux _ lift fac_left fac_right fun s m w => uniq s m (w WalkingCospan.left) (w WalkingCospan.right) #align category_theory.limits.pullback_cone.is_limit.mk CategoryTheory.Limits.PullbackCone.IsLimit.mk @[simps] def Cone.ofPullbackCone {F : WalkingCospan ⥤ C} (t : PullbackCone (F.map inl) (F.map inr)) : Cone F where pt := t.pt π := t.π ≫ (diagramIsoCospan F).inv #align category_theory.limits.cone.of_pullback_cone CategoryTheory.Limits.Cone.ofPullbackCone @[simps] def Cocone.ofPushoutCocone {F : WalkingSpan ⥤ C} (t : PushoutCocone (F.map fst) (F.map snd)) : Cocone F where pt := t.pt ι := (diagramIsoSpan F).hom ≫ t.ι #align category_theory.limits.cocone.of_pushout_cocone CategoryTheory.Limits.Cocone.ofPushoutCocone @[simps] def PullbackCone.ofCone {F : WalkingCospan ⥤ C} (t : Cone F) : PullbackCone (F.map inl) (F.map inr) where pt := t.pt π := t.π ≫ (diagramIsoCospan F).hom #align category_theory.limits.pullback_cone.of_cone CategoryTheory.Limits.PullbackCone.ofCone @[simps!] def PullbackCone.isoMk {F : WalkingCospan ⥤ C} (t : Cone F) : (Cones.postcompose (diagramIsoCospan.{v} _).hom).obj t ≅ PullbackCone.mk (t.π.app WalkingCospan.left) (t.π.app WalkingCospan.right) ((t.π.naturality inl).symm.trans (t.π.naturality inr : _)) := Cones.ext (Iso.refl _) <\| by rintro (_ \| (_ \| _)) <;> · dsimp simp #align category_theory.limits.pullback_cone.iso_mk CategoryTheory.Limits.PullbackCone.isoMk @[simps] def PushoutCocone.ofCocone {F : WalkingSpan ⥤ C} (t : Cocone F) : PushoutCocone (F.map fst) (F.map snd) where pt := t.pt ι := (diagramIsoSpan F).inv ≫ t.ι #align category_theory.limits.pushout_cocone.of_cocone CategoryTheory.Limits.PushoutCocone.ofCocone @[simps!] def PushoutCocone.isoMk {F : WalkingSpan ⥤ C} (t : Cocone F) : (Cocones.precompose (diagramIsoSpan.{v} _).inv).obj t ≅ PushoutCocone.mk (t.ι.app WalkingSpan.left) (t.ι.app WalkingSpan.right) ((t.ι.naturality fst).trans (t.ι.naturality snd).symm) := Cocones.ext (Iso.refl _) <\| by rintro (_ \| (_ \| _)) <;> · dsimp simp #align category_theory.limits.pushout_cocone.iso_mk CategoryTheory.Limits.PushoutCocone.isoMk abbrev HasPullback {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) := HasLimit (cospan f g) #align category_theory.limits.has_pullback CategoryTheory.Limits.HasPullback abbrev HasPushout {X Y Z : C} (f : X ⟶ Y) (g : X ⟶ Z) := HasColimit (span f g) #align category_theory.limits.has_pushout CategoryTheory.Limits.HasPushout abbrev pullback {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) [HasPullback f g] := limit (cospan f g) #align category_theory.limits.pullback CategoryTheory.Limits.pullback abbrev pushout {X Y Z : C} (f : X ⟶ Y) (g : X ⟶ Z) [HasPushout f g] := colimit (span f g) #align category_theory.limits.pushout CategoryTheory.Limits.pushout abbrev pullback.fst {X Y Z : C} {f : X ⟶ Z} {g : Y ⟶ Z} [HasPullback f g] : pullback f g ⟶ X := limit.π (cospan f g) WalkingCospan.left #align category_theory.limits.pullback.fst CategoryTheory.Limits.pullback.fst abbrev pullback.snd {X Y Z : C} {f : X ⟶ Z} {g : Y ⟶ Z} [HasPullback f g] : pullback f g ⟶ Y := limit.π (cospan f g) WalkingCospan.right #align category_theory.limits.pullback.snd CategoryTheory.Limits.pullback.snd abbrev pushout.inl {X Y Z : C} {f : X ⟶ Y} {g : X ⟶ Z} [HasPushout f g] : Y ⟶ pushout f g := colimit.ι (span f g) WalkingSpan.left #align category_theory.limits.pushout.inl CategoryTheory.Limits.pushout.inl abbrev pushout.inr {X Y Z : C} {f : X ⟶ Y} {g : X ⟶ Z} [HasPushout f g] : Z ⟶ pushout f g := colimit.ι (span f g) WalkingSpan.right #align category_theory.limits.pushout.inr CategoryTheory.Limits.pushout.inr abbrev pullback.lift {W X Y Z : C} {f : X ⟶ Z} {g : Y ⟶ Z} [HasPullback f g] (h : W ⟶ X) (k : W ⟶ Y) (w : h ≫ f = k ≫ g) : W ⟶ pullback f g := limit.lift _ (PullbackCone.mk h k w) #align category_theory.limits.pullback.lift CategoryTheory.Limits.pullback.lift abbrev pushout.desc {W X Y Z : C} {f : X ⟶ Y} {g : X ⟶ Z} [HasPushout f g] (h : Y ⟶ W) (k : Z ⟶ W) (w : f ≫ h = g ≫ k) : pushout f g ⟶ W := colimit.desc _ (PushoutCocone.mk h k w) #align category_theory.limits.pushout.desc CategoryTheory.Limits.pushout.desc @[simp] theorem PullbackCone.fst_colimit_cocone {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) [HasLimit (cospan f g)] : PullbackCone.fst (limit.cone (cospan f g)) = pullback.fst := rfl #align category_theory.limits.pullback_cone.fst_colimit_cocone CategoryTheory.Limits.PullbackCone.fst_colimit_cocone @[simp] theorem PullbackCone.snd_colimit_cocone {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) [HasLimit (cospan f g)] : PullbackCone.snd (limit.cone (cospan f g)) = pullback.snd := rfl #align category_theory.limits.pullback_cone.snd_colimit_cocone CategoryTheory.Limits.PullbackCone.snd_colimit_cocone -- Porting note (#10618): simp can prove this; removed simp theorem PushoutCocone.inl_colimit_cocone {X Y Z : C} (f : Z ⟶ X) (g : Z ⟶ Y) [HasColimit (span f g)] : PushoutCocone.inl (colimit.cocone (span f g)) = pushout.inl := rfl #align category_theory.limits.pushout_cocone.inl_colimit_cocone CategoryTheory.Limits.PushoutCocone.inl_colimit_cocone -- Porting note (#10618): simp can prove this; removed simp theorem PushoutCocone.inr_colimit_cocone {X Y Z : C} (f : Z ⟶ X) (g : Z ⟶ Y) [HasColimit (span f g)] : PushoutCocone.inr (colimit.cocone (span f g)) = pushout.inr := rfl #align category_theory.limits.pushout_cocone.inr_colimit_cocone CategoryTheory.Limits.PushoutCocone.inr_colimit_cocone -- Porting note (#10618): simp can prove this and reassoced version; removed simp @[reassoc] theorem pullback.lift_fst {W X Y Z : C} {f : X ⟶ Z} {g : Y ⟶ Z} [HasPullback f g] (h : W ⟶ X) (k : W ⟶ Y) (w : h ≫ f = k ≫ g) : pullback.lift h k w ≫ pullback.fst = h := limit.lift_π _ _ #align category_theory.limits.pullback.lift_fst CategoryTheory.Limits.pullback.lift_fst -- Porting note (#10618): simp can prove this and reassoced version; removed simp @[reassoc] theorem pullback.lift_snd {W X Y Z : C} {f : X ⟶ Z} {g : Y ⟶ Z} [HasPullback f g] (h : W ⟶ X) (k : W ⟶ Y) (w : h ≫ f = k ≫ g) : pullback.lift h k w ≫ pullback.snd = k := limit.lift_π _ _ #align category_theory.limits.pullback.lift_snd CategoryTheory.Limits.pullback.lift_snd -- Porting note (#10618): simp can prove this and reassoced version; removed simp @[reassoc] theorem pushout.inl_desc {W X Y Z : C} {f : X ⟶ Y} {g : X ⟶ Z} [HasPushout f g] (h : Y ⟶ W) (k : Z ⟶ W) (w : f ≫ h = g ≫ k) : pushout.inl ≫ pushout.desc h k w = h := colimit.ι_desc _ _ #align category_theory.limits.pushout.inl_desc CategoryTheory.Limits.pushout.inl_desc -- Porting note (#10618): simp can prove this and reassoced version; removed simp @[reassoc] theorem pushout.inr_desc {W X Y Z : C} {f : X ⟶ Y} {g : X ⟶ Z} [HasPushout f g] (h : Y ⟶ W) (k : Z ⟶ W) (w : f ≫ h = g ≫ k) : pushout.inr ≫ pushout.desc h k w = k := colimit.ι_desc _ _ #align category_theory.limits.pushout.inr_desc CategoryTheory.Limits.pushout.inr_desc def pullback.lift' {W X Y Z : C} {f : X ⟶ Z} {g : Y ⟶ Z} [HasPullback f g] (h : W ⟶ X) (k : W ⟶ Y) (w : h ≫ f = k ≫ g) : { l : W ⟶ pullback f g // l ≫ pullback.fst = h ∧ l ≫ pullback.snd = k } := ⟨pullback.lift h k w, pullback.lift_fst _ _ _, pullback.lift_snd _ _ _⟩ #align category_theory.limits.pullback.lift' CategoryTheory.Limits.pullback.lift' def pullback.desc' {W X Y Z : C} {f : X ⟶ Y} {g : X ⟶ Z} [HasPushout f g] (h : Y ⟶ W) (k : Z ⟶ W) (w : f ≫ h = g ≫ k) : { l : pushout f g ⟶ W // pushout.inl ≫ l = h ∧ pushout.inr ≫ l = k } := ⟨pushout.desc h k w, pushout.inl_desc _ _ _, pushout.inr_desc _ _ _⟩ #align category_theory.limits.pullback.desc' CategoryTheory.Limits.pullback.desc' @[reassoc] theorem pullback.condition {X Y Z : C} {f : X ⟶ Z} {g : Y ⟶ Z} [HasPullback f g] : (pullback.fst : pullback f g ⟶ X) ≫ f = pullback.snd ≫ g := PullbackCone.condition _ #align category_theory.limits.pullback.condition CategoryTheory.Limits.pullback.condition @[reassoc] theorem pushout.condition {X Y Z : C} {f : X ⟶ Y} {g : X ⟶ Z} [HasPushout f g] : f ≫ (pushout.inl : Y ⟶ pushout f g) = g ≫ pushout.inr := PushoutCocone.condition _ #align category_theory.limits.pushout.condition CategoryTheory.Limits.pushout.condition abbrev pullback.map {W X Y Z S T : C} (f₁ : W ⟶ S) (f₂ : X ⟶ S) [HasPullback f₁ f₂] (g₁ : Y ⟶ T) (g₂ : Z ⟶ T) [HasPullback g₁ g₂] (i₁ : W ⟶ Y) (i₂ : X ⟶ Z) (i₃ : S ⟶ T) (eq₁ : f₁ ≫ i₃ = i₁ ≫ g₁) (eq₂ : f₂ ≫ i₃ = i₂ ≫ g₂) : pullback f₁ f₂ ⟶ pullback g₁ g₂ := pullback.lift (pullback.fst ≫ i₁) (pullback.snd ≫ i₂) (by simp [← eq₁, ← eq₂, pullback.condition_assoc]) #align category_theory.limits.pullback.map CategoryTheory.Limits.pullback.map abbrev pullback.mapDesc {X Y S T : C} (f : X ⟶ S) (g : Y ⟶ S) (i : S ⟶ T) [HasPullback f g] [HasPullback (f ≫ i) (g ≫ i)] : pullback f g ⟶ pullback (f ≫ i) (g ≫ i) := pullback.map f g (f ≫ i) (g ≫ i) (𝟙 _) (𝟙 _) i (Category.id_comp _).symm (Category.id_comp _).symm #align category_theory.limits.pullback.map_desc CategoryTheory.Limits.pullback.mapDesc abbrev pushout.map {W X Y Z S T : C} (f₁ : S ⟶ W) (f₂ : S ⟶ X) [HasPushout f₁ f₂] (g₁ : T ⟶ Y) (g₂ : T ⟶ Z) [HasPushout g₁ g₂] (i₁ : W ⟶ Y) (i₂ : X ⟶ Z) (i₃ : S ⟶ T) (eq₁ : f₁ ≫ i₁ = i₃ ≫ g₁) (eq₂ : f₂ ≫ i₂ = i₃ ≫ g₂) : pushout f₁ f₂ ⟶ pushout g₁ g₂ := pushout.desc (i₁ ≫ pushout.inl) (i₂ ≫ pushout.inr) (by simp only [← Category.assoc, eq₁, eq₂] simp [pushout.condition]) #align category_theory.limits.pushout.map CategoryTheory.Limits.pushout.map abbrev pushout.mapLift {X Y S T : C} (f : T ⟶ X) (g : T ⟶ Y) (i : S ⟶ T) [HasPushout f g] [HasPushout (i ≫ f) (i ≫ g)] : pushout (i ≫ f) (i ≫ g) ⟶ pushout f g := pushout.map (i ≫ f) (i ≫ g) f g (𝟙 _) (𝟙 _) i (Category.comp_id _) (Category.comp_id _) #align category_theory.limits.pushout.map_lift CategoryTheory.Limits.pushout.mapLift @[ext 1100] theorem pullback.hom_ext {X Y Z : C} {f : X ⟶ Z} {g : Y ⟶ Z} [HasPullback f g] {W : C} {k l : W ⟶ pullback f g} (h₀ : k ≫ pullback.fst = l ≫ pullback.fst) (h₁ : k ≫ pullback.snd = l ≫ pullback.snd) : k = l := limit.hom_ext <\| PullbackCone.equalizer_ext _ h₀ h₁ #align category_theory.limits.pullback.hom_ext CategoryTheory.Limits.pullback.hom_ext def pullbackIsPullback {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) [HasPullback f g] : IsLimit (PullbackCone.mk (pullback.fst : pullback f g ⟶ _) pullback.snd pullback.condition) := PullbackCone.IsLimit.mk _ (fun s => pullback.lift s.fst s.snd s.condition) (by simp) (by simp) (by aesop_cat) #align category_theory.limits.pullback_is_pullback CategoryTheory.Limits.pullbackIsPullback instance pullback.fst_of_mono {X Y Z : C} {f : X ⟶ Z} {g : Y ⟶ Z} [HasPullback f g] [Mono g] : Mono (pullback.fst : pullback f g ⟶ X) := PullbackCone.mono_fst_of_is_pullback_of_mono (limit.isLimit _) #align category_theory.limits.pullback.fst_of_mono CategoryTheory.Limits.pullback.fst_of_mono instance pullback.snd_of_mono {X Y Z : C} {f : X ⟶ Z} {g : Y ⟶ Z} [HasPullback f g] [Mono f] : Mono (pullback.snd : pullback f g ⟶ Y) := PullbackCone.mono_snd_of_is_pullback_of_mono (limit.isLimit _) #align category_theory.limits.pullback.snd_of_mono CategoryTheory.Limits.pullback.snd_of_mono instance mono_pullback_to_prod {C : Type} [Category C] {X Y Z : C} (f : X ⟶ Z) (g : Y ⟶ Z) [HasPullback f g] [HasBinaryProduct X Y] : Mono (prod.lift pullback.fst pullback.snd : pullback f g ⟶ _) := ⟨fun {W} i₁ i₂ h => by ext · simpa using congrArg (fun f => f ≫ prod.fst) h · simpa using congrArg (fun f => f ≫ prod.snd) h⟩ #align category_theory.limits.mono_pullback_to_prod CategoryTheory.Limits.mono_pullback_to_prod @[ext 1100] theorem pushout.hom_ext {X Y Z : C} {f : X ⟶ Y} {g : X ⟶ Z} [HasPushout f g] {W : C} {k l : pushout f g ⟶ W} (h₀ : pushout.inl ≫ k = pushout.inl ≫ l) (h₁ : pushout.inr ≫ k = pushout.inr ≫ l) : k = l := colimit.hom_ext <\| PushoutCocone.coequalizer_ext _ h₀ h₁ #align category_theory.limits.pushout.hom_ext CategoryTheory.Limits.pushout.hom_ext def pushoutIsPushout {X Y Z : C} (f : X ⟶ Y) (g : X ⟶ Z) [HasPushout f g] : IsColimit (PushoutCocone.mk (pushout.inl : _ ⟶ pushout f g) pushout.inr pushout.condition) := PushoutCocone.IsColimit.mk _ (fun s => pushout.desc s.inl s.inr s.condition) (by simp) (by simp) (by aesop_cat) #align category_theory.limits.pushout_is_pushout CategoryTheory.Limits.pushoutIsPushout instance pushout.inl_of_epi {X Y Z : C} {f : X ⟶ Y} {g : X ⟶ Z} [HasPushout f g] [Epi g] : Epi (pushout.inl : Y ⟶ pushout f g) := PushoutCocone.epi_inl_of_is_pushout_of_epi (colimit.isColimit _) #align category_theory.limits.pushout.inl_of_epi CategoryTheory.Limits.pushout.inl_of_epi instance pushout.inr_of_epi {X Y Z : C} {f : X ⟶ Y} {g : X ⟶ Z} [HasPushout f g] [Epi f] : Epi (pushout.inr : Z ⟶ pushout f g) := PushoutCocone.epi_inr_of_is_pushout_of_epi (colimit.isColimit _) #align category_theory.limits.pushout.inr_of_epi CategoryTheory.Limits.pushout.inr_of_epi instance epi_coprod_to_pushout {C : Type} [Category C] {X Y Z : C} (f : X ⟶ Y) (g : X ⟶ Z) [HasPushout f g] [HasBinaryCoproduct Y Z] : Epi (coprod.desc pushout.inl pushout.inr : _ ⟶ pushout f g) := ⟨fun {W} i₁ i₂ h => by ext · simpa using congrArg (fun f => coprod.inl ≫ f) h · simpa using congrArg (fun f => coprod.inr ≫ f) h⟩ #align category_theory.limits.epi_coprod_to_pushout CategoryTheory.Limits.epi_coprod_to_pushout instance pullback.map_isIso {W X Y Z S T : C} (f₁ : W ⟶ S) (f₂ : X ⟶ S) [HasPullback f₁ f₂] (g₁ : Y ⟶ T) (g₂ : Z ⟶ T) [HasPullback g₁ g₂] (i₁ : W ⟶ Y) (i₂ : X ⟶ Z) (i₃ : S ⟶ T) (eq₁ : f₁ ≫ i₃ = i₁ ≫ g₁) (eq₂ : f₂ ≫ i₃ = i₂ ≫ g₂) [IsIso i₁] [IsIso i₂] [IsIso i₃] : IsIso (pullback.map f₁ f₂ g₁ g₂ i₁ i₂ i₃ eq₁ eq₂) := by refine ⟨⟨pullback.map _ _ _ _ (inv i₁) (inv i₂) (inv i₃) ?_ ?_, ?_, ?_⟩⟩ · rw [IsIso.comp_inv_eq, Category.assoc, eq₁, IsIso.inv_hom_id_assoc] · rw [IsIso.comp_inv_eq, Category.assoc, eq₂, IsIso.inv_hom_id_assoc] · aesop_cat · aesop_cat #align category_theory.limits.pullback.map_is_iso CategoryTheory.Limits.pullback.map_isIso @[simps! hom] def pullback.congrHom {X Y Z : C} {f₁ f₂ : X ⟶ Z} {g₁ g₂ : Y ⟶ Z} (h₁ : f₁ = f₂) (h₂ : g₁ = g₂) [HasPullback f₁ g₁] [HasPullback f₂ g₂] : pullback f₁ g₁ ≅ pullback f₂ g₂ := asIso <\| pullback.map _ _ _ _ (𝟙 _) (𝟙 _) (𝟙 _) (by simp [h₁]) (by simp [h₂]) #align category_theory.limits.pullback.congr_hom CategoryTheory.Limits.pullback.congrHom @[simp] theorem pullback.congrHom_inv {X Y Z : C} {f₁ f₂ : X ⟶ Z} {g₁ g₂ : Y ⟶ Z} (h₁ : f₁ = f₂) (h₂ : g₁ = g₂) [HasPullback f₁ g₁] [HasPullback f₂ g₂] : (pullback.congrHom h₁ h₂).inv = pullback.map _ _ _ _ (𝟙 _) (𝟙 _) (𝟙 _) (by simp [h₁]) (by simp [h₂]) := by ext · erw [pullback.lift_fst] rw [Iso.inv_comp_eq] erw [pullback.lift_fst_assoc] rw [Category.comp_id, Category.comp_id] · erw [pullback.lift_snd] rw [Iso.inv_comp_eq] erw [pullback.lift_snd_assoc] rw [Category.comp_id, Category.comp_id] #align category_theory.limits.pullback.congr_hom_inv CategoryTheory.Limits.pullback.congrHom_inv instance pushout.map_isIso {W X Y Z S T : C} (f₁ : S ⟶ W) (f₂ : S ⟶ X) [HasPushout f₁ f₂] (g₁ : T ⟶ Y) (g₂ : T ⟶ Z) [HasPushout g₁ g₂] (i₁ : W ⟶ Y) (i₂ : X ⟶ Z) (i₃ : S ⟶ T) (eq₁ : f₁ ≫ i₁ = i₃ ≫ g₁) (eq₂ : f₂ ≫ i₂ = i₃ ≫ g₂) [IsIso i₁] [IsIso i₂] [IsIso i₃] : IsIso (pushout.map f₁ f₂ g₁ g₂ i₁ i₂ i₃ eq₁ eq₂) := by refine ⟨⟨pushout.map _ _ _ _ (inv i₁) (inv i₂) (inv i₃) ?_ ?_, ?_, ?_⟩⟩ · rw [IsIso.comp_inv_eq, Category.assoc, eq₁, IsIso.inv_hom_id_assoc] · rw [IsIso.comp_inv_eq, Category.assoc, eq₂, IsIso.inv_hom_id_assoc] · aesop_cat · aesop_cat #align category_theory.limits.pushout.map_is_iso CategoryTheory.Limits.pushout.map_isIso theorem pullback.mapDesc_comp {X Y S T S' : C} (f : X ⟶ T) (g : Y ⟶ T) (i : T ⟶ S) (i' : S ⟶ S') [HasPullback f g] [HasPullback (f ≫ i) (g ≫ i)] [HasPullback (f ≫ i ≫ i') (g ≫ i ≫ i')] [HasPullback ((f ≫ i) ≫ i') ((g ≫ i) ≫ i')] : pullback.mapDesc f g (i ≫ i') = pullback.mapDesc f g i ≫ pullback.mapDesc _ _ i' ≫ (pullback.congrHom (Category.assoc _ _ _) (Category.assoc _ _ _)).hom := by aesop_cat #align category_theory.limits.pullback.map_desc_comp CategoryTheory.Limits.pullback.mapDesc_comp @[simps! hom] def pushout.congrHom {X Y Z : C} {f₁ f₂ : X ⟶ Y} {g₁ g₂ : X ⟶ Z} (h₁ : f₁ = f₂) (h₂ : g₁ = g₂) [HasPushout f₁ g₁] [HasPushout f₂ g₂] : pushout f₁ g₁ ≅ pushout f₂ g₂ := asIso <\| pushout.map _ _ _ _ (𝟙 _) (𝟙 _) (𝟙 _) (by simp [h₁]) (by simp [h₂]) #align category_theory.limits.pushout.congr_hom CategoryTheory.Limits.pushout.congrHom @[simp] theorem pushout.congrHom_inv {X Y Z : C} {f₁ f₂ : X ⟶ Y} {g₁ g₂ : X ⟶ Z} (h₁ : f₁ = f₂) (h₂ : g₁ = g₂) [HasPushout f₁ g₁] [HasPushout f₂ g₂] : (pushout.congrHom h₁ h₂).inv = pushout.map _ _ _ _ (𝟙 _) (𝟙 _) (𝟙 _) (by simp [h₁]) (by simp [h₂]) := by ext · erw [pushout.inl_desc] rw [Iso.comp_inv_eq, Category.id_comp] erw [pushout.inl_desc] rw [Category.id_comp] · erw [pushout.inr_desc] rw [Iso.comp_inv_eq, Category.id_comp] erw [pushout.inr_desc] rw [Category.id_comp] #align category_theory.limits.pushout.congr_hom_inv CategoryTheory.Limits.pushout.congrHom_inv theorem pushout.mapLift_comp {X Y S T S' : C} (f : T ⟶ X) (g : T ⟶ Y) (i : S ⟶ T) (i' : S' ⟶ S) [HasPushout f g] [HasPushout (i ≫ f) (i ≫ g)] [HasPushout (i' ≫ i ≫ f) (i' ≫ i ≫ g)] [HasPushout ((i' ≫ i) ≫ f) ((i' ≫ i) ≫ g)] : pushout.mapLift f g (i' ≫ i) = (pushout.congrHom (Category.assoc _ _ _) (Category.assoc _ _ _)).hom ≫ pushout.mapLift _ _ i' ≫ pushout.mapLift f g i := by aesop_cat #align category_theory.limits.pushout.map_lift_comp CategoryTheory.Limits.pushout.mapLift_comp section variable (G : C ⥤ D) def pullbackComparison (f : X ⟶ Z) (g : Y ⟶ Z) [HasPullback f g] [HasPullback (G.map f) (G.map g)] : G.obj (pullback f g) ⟶ pullback (G.map f) (G.map g) := pullback.lift (G.map pullback.fst) (G.map pullback.snd) (by simp only [← G.map_comp, pullback.condition]) #align category_theory.limits.pullback_comparison CategoryTheory.Limits.pullbackComparison @[reassoc (attr := simp)] theorem pullbackComparison_comp_fst (f : X ⟶ Z) (g : Y ⟶ Z) [HasPullback f g] [HasPullback (G.map f) (G.map g)] : pullbackComparison G f g ≫ pullback.fst = G.map pullback.fst := pullback.lift_fst _ _ _ #align category_theory.limits.pullback_comparison_comp_fst CategoryTheory.Limits.pullbackComparison_comp_fst @[reassoc (attr := simp)] theorem pullbackComparison_comp_snd (f : X ⟶ Z) (g : Y ⟶ Z) [HasPullback f g] [HasPullback (G.map f) (G.map g)] : pullbackComparison G f g ≫ pullback.snd = G.map pullback.snd := pullback.lift_snd _ _ _ #align category_theory.limits.pullback_comparison_comp_snd CategoryTheory.Limits.pullbackComparison_comp_snd @[reassoc (attr := simp)] theorem map_lift_pullbackComparison (f : X ⟶ Z) (g : Y ⟶ Z) [HasPullback f g] [HasPullback (G.map f) (G.map g)] {W : C} {h : W ⟶ X} {k : W ⟶ Y} (w : h ≫ f = k ≫ g) : G.map (pullback.lift _ _ w) ≫ pullbackComparison G f g = pullback.lift (G.map h) (G.map k) (by simp only [← G.map_comp, w]) := by ext <;> simp [← G.map_comp] #align category_theory.limits.map_lift_pullback_comparison CategoryTheory.Limits.map_lift_pullbackComparison def pushoutComparison (f : X ⟶ Y) (g : X ⟶ Z) [HasPushout f g] [HasPushout (G.map f) (G.map g)] : pushout (G.map f) (G.map g) ⟶ G.obj (pushout f g) := pushout.desc (G.map pushout.inl) (G.map pushout.inr) (by simp only [← G.map_comp, pushout.condition]) #align category_theory.limits.pushout_comparison CategoryTheory.Limits.pushoutComparison @[reassoc (attr := simp)] theorem inl_comp_pushoutComparison (f : X ⟶ Y) (g : X ⟶ Z) [HasPushout f g] [HasPushout (G.map f) (G.map g)] : pushout.inl ≫ pushoutComparison G f g = G.map pushout.inl := pushout.inl_desc _ _ _ #align category_theory.limits.inl_comp_pushout_comparison CategoryTheory.Limits.inl_comp_pushoutComparison @[reassoc (attr := simp)] theorem inr_comp_pushoutComparison (f : X ⟶ Y) (g : X ⟶ Z) [HasPushout f g] [HasPushout (G.map f) (G.map g)] : pushout.inr ≫ pushoutComparison G f g = G.map pushout.inr := pushout.inr_desc _ _ _ #align category_theory.limits.inr_comp_pushout_comparison CategoryTheory.Limits.inr_comp_pushoutComparison @[reassoc (attr := simp)] theorem pushoutComparison_map_desc (f : X ⟶ Y) (g : X ⟶ Z) [HasPushout f g] [HasPushout (G.map f) (G.map g)] {W : C} {h : Y ⟶ W} {k : Z ⟶ W} (w : f ≫ h = g ≫ k) : pushoutComparison G f g ≫ G.map (pushout.desc _ _ w) = pushout.desc (G.map h) (G.map k) (by simp only [← G.map_comp, w]) := by ext <;> simp [← G.map_comp] #align category_theory.limits.pushout_comparison_map_desc CategoryTheory.Limits.pushoutComparison_map_desc end section open WalkingCospan variable (f : X ⟶ Y) instance has_kernel_pair_of_mono [Mono f] : HasPullback f f := ⟨⟨⟨_, PullbackCone.isLimitMkIdId f⟩⟩⟩ #align category_theory.limits.has_kernel_pair_of_mono CategoryTheory.Limits.has_kernel_pair_of_mono theorem fst_eq_snd_of_mono_eq [Mono f] : (pullback.fst : pullback f f ⟶ _) = pullback.snd := ((PullbackCone.isLimitMkIdId f).fac (getLimitCone (cospan f f)).cone left).symm.trans ((PullbackCone.isLimitMkIdId f).fac (getLimitCone (cospan f f)).cone right : _) #align category_theory.limits.fst_eq_snd_of_mono_eq CategoryTheory.Limits.fst_eq_snd_of_mono_eq @[simp] theorem pullbackSymmetry_hom_of_mono_eq [Mono f] : (pullbackSymmetry f f).hom = 𝟙 _ := by ext · simp [fst_eq_snd_of_mono_eq] · simp [fst_eq_snd_of_mono_eq] #align category_theory.limits.pullback_symmetry_hom_of_mono_eq CategoryTheory.Limits.pullbackSymmetry_hom_of_mono_eq instance fst_iso_of_mono_eq [Mono f] : IsIso (pullback.fst : pullback f f ⟶ _) := by refine ⟨⟨pullback.lift (𝟙 _) (𝟙 _) (by simp), ?_, by simp⟩⟩ ext · simp · simp [fst_eq_snd_of_mono_eq] #align category_theory.limits.fst_iso_of_mono_eq CategoryTheory.Limits.fst_iso_of_mono_eq instance snd_iso_of_mono_eq [Mono f] : IsIso (pullback.snd : pullback f f ⟶ _) := by rw [← fst_eq_snd_of_mono_eq] infer_instance #align category_theory.limits.snd_iso_of_mono_eq CategoryTheory.Limits.snd_iso_of_mono_eq end section open WalkingSpan variable (f : X ⟶ Y) instance has_cokernel_pair_of_epi [Epi f] : HasPushout f f := ⟨⟨⟨_, PushoutCocone.isColimitMkIdId f⟩⟩⟩ #align category_theory.limits.has_cokernel_pair_of_epi CategoryTheory.Limits.has_cokernel_pair_of_epi theorem inl_eq_inr_of_epi_eq [Epi f] : (pushout.inl : _ ⟶ pushout f f) = pushout.inr := ((PushoutCocone.isColimitMkIdId f).fac (getColimitCocone (span f f)).cocone left).symm.trans ((PushoutCocone.isColimitMkIdId f).fac (getColimitCocone (span f f)).cocone right : _) #align category_theory.limits.inl_eq_inr_of_epi_eq CategoryTheory.Limits.inl_eq_inr_of_epi_eq @[simp] theorem pullback_symmetry_hom_of_epi_eq [Epi f] : (pushoutSymmetry f f).hom = 𝟙 _ := by ext <;> simp [inl_eq_inr_of_epi_eq] #align category_theory.limits.pullback_symmetry_hom_of_epi_eq CategoryTheory.Limits.pullback_symmetry_hom_of_epi_eq instance inl_iso_of_epi_eq [Epi f] : IsIso (pushout.inl : _ ⟶ pushout f f) := by refine ⟨⟨pushout.desc (𝟙 _) (𝟙 _) (by simp), by simp, ?_⟩⟩ apply pushout.hom_ext · simp · simp [inl_eq_inr_of_epi_eq] #align category_theory.limits.inl_iso_of_epi_eq CategoryTheory.Limits.inl_iso_of_epi_eq instance inr_iso_of_epi_eq [Epi f] : IsIso (pushout.inr : _ ⟶ pushout f f) := by rw [← inl_eq_inr_of_epi_eq] infer_instance #align category_theory.limits.inr_iso_of_epi_eq CategoryTheory.Limits.inr_iso_of_epi_eq end section variable (f : X ⟶ Z) (g : Y ⟶ Z) (f' : W ⟶ X) variable [HasPullback f g] [HasPullback f' (pullback.fst : pullback f g ⟶ _)] variable [HasPullback (f' ≫ f) g] noncomputable def pullbackRightPullbackFstIso : pullback f' (pullback.fst : pullback f g ⟶ _) ≅ pullback (f' ≫ f) g := by let this := bigSquareIsPullback (pullback.snd : pullback f' (pullback.fst : pullback f g ⟶ _) ⟶ _) pullback.snd f' f pullback.fst pullback.fst g pullback.condition pullback.condition (pullbackIsPullback _ _) (pullbackIsPullback _ _) exact (this.conePointUniqueUpToIso (pullbackIsPullback _ _) : _) #align category_theory.limits.pullback_right_pullback_fst_iso CategoryTheory.Limits.pullbackRightPullbackFstIso @[reassoc (attr := simp)] theorem pullbackRightPullbackFstIso_hom_fst : (pullbackRightPullbackFstIso f g f').hom ≫ pullback.fst = pullback.fst := IsLimit.conePointUniqueUpToIso_hom_comp _ _ WalkingCospan.left #align category_theory.limits.pullback_right_pullback_fst_iso_hom_fst CategoryTheory.Limits.pullbackRightPullbackFstIso_hom_fst @[reassoc (attr := simp)] theorem pullbackRightPullbackFstIso_hom_snd : (pullbackRightPullbackFstIso f g f').hom ≫ pullback.snd = pullback.snd ≫ pullback.snd := IsLimit.conePointUniqueUpToIso_hom_comp _ _ WalkingCospan.right #align category_theory.limits.pullback_right_pullback_fst_iso_hom_snd CategoryTheory.Limits.pullbackRightPullbackFstIso_hom_snd @[reassoc (attr := simp)] theorem pullbackRightPullbackFstIso_inv_fst : (pullbackRightPullbackFstIso f g f').inv ≫ pullback.fst = pullback.fst := IsLimit.conePointUniqueUpToIso_inv_comp _ _ WalkingCospan.left #align category_theory.limits.pullback_right_pullback_fst_iso_inv_fst CategoryTheory.Limits.pullbackRightPullbackFstIso_inv_fst @[reassoc (attr := simp)] theorem pullbackRightPullbackFstIso_inv_snd_snd : (pullbackRightPullbackFstIso f g f').inv ≫ pullback.snd ≫ pullback.snd = pullback.snd := IsLimit.conePointUniqueUpToIso_inv_comp _ _ WalkingCospan.right #align category_theory.limits.pullback_right_pullback_fst_iso_inv_snd_snd CategoryTheory.Limits.pullbackRightPullbackFstIso_inv_snd_snd @[reassoc (attr := simp)] theorem pullbackRightPullbackFstIso_inv_snd_fst : (pullbackRightPullbackFstIso f g f').inv ≫ pullback.snd ≫ pullback.fst = pullback.fst ≫ f' := by rw [← pullback.condition] exact pullbackRightPullbackFstIso_inv_fst_assoc _ _ _ _ #align category_theory.limits.pullback_right_pullback_fst_iso_inv_snd_fst CategoryTheory.Limits.pullbackRightPullbackFstIso_inv_snd_fst end section variable (f : X ⟶ Y) (g : X ⟶ Z) (g' : Z ⟶ W) variable [HasPushout f g] [HasPushout (pushout.inr : _ ⟶ pushout f g) g'] variable [HasPushout f (g ≫ g')] noncomputable def pushoutLeftPushoutInrIso : pushout (pushout.inr : _ ⟶ pushout f g) g' ≅ pushout f (g ≫ g') := ((bigSquareIsPushout g g' _ _ f _ _ pushout.condition pushout.condition (pushoutIsPushout _ _) (pushoutIsPushout _ _)).coconePointUniqueUpToIso (pushoutIsPushout _ _) : _) #align category_theory.limits.pushout_left_pushout_inr_iso CategoryTheory.Limits.pushoutLeftPushoutInrIso @[reassoc (attr := simp)] theorem inl_pushoutLeftPushoutInrIso_inv : pushout.inl ≫ (pushoutLeftPushoutInrIso f g g').inv = pushout.inl ≫ pushout.inl := ((bigSquareIsPushout g g' _ _ f _ _ pushout.condition pushout.condition (pushoutIsPushout _ _) (pushoutIsPushout _ _)).comp_coconePointUniqueUpToIso_inv (pushoutIsPushout _ _) WalkingSpan.left : _) #align category_theory.limits.inl_pushout_left_pushout_inr_iso_inv CategoryTheory.Limits.inl_pushoutLeftPushoutInrIso_inv @[reassoc (attr := simp)] theorem inr_pushoutLeftPushoutInrIso_hom : pushout.inr ≫ (pushoutLeftPushoutInrIso f g g').hom = pushout.inr := ((bigSquareIsPushout g g' _ _ f _ _ pushout.condition pushout.condition (pushoutIsPushout _ _) (pushoutIsPushout _ _)).comp_coconePointUniqueUpToIso_hom (pushoutIsPushout _ _) WalkingSpan.right : _) #align category_theory.limits.inr_pushout_left_pushout_inr_iso_hom CategoryTheory.Limits.inr_pushoutLeftPushoutInrIso_hom @[reassoc (attr := simp)] theorem inr_pushoutLeftPushoutInrIso_inv : pushout.inr ≫ (pushoutLeftPushoutInrIso f g g').inv = pushout.inr := by rw [Iso.comp_inv_eq, inr_pushoutLeftPushoutInrIso_hom] #align category_theory.limits.inr_pushout_left_pushout_inr_iso_inv CategoryTheory.Limits.inr_pushoutLeftPushoutInrIso_inv @[reassoc (attr := simp)] theorem inl_inl_pushoutLeftPushoutInrIso_hom : pushout.inl ≫ pushout.inl ≫ (pushoutLeftPushoutInrIso f g g').hom = pushout.inl := by rw [← Category.assoc, ← Iso.eq_comp_inv, inl_pushoutLeftPushoutInrIso_inv] #align category_theory.limits.inl_inl_pushout_left_pushout_inr_iso_hom CategoryTheory.Limits.inl_inl_pushoutLeftPushoutInrIso_hom @[reassoc (attr := simp)] theorem inr_inl_pushoutLeftPushoutInrIso_hom : pushout.inr ≫ pushout.inl ≫ (pushoutLeftPushoutInrIso f g g').hom = g' ≫ pushout.inr := by rw [← Category.assoc, ← Iso.eq_comp_inv, Category.assoc, inr_pushoutLeftPushoutInrIso_inv, pushout.condition] #align category_theory.limits.inr_inl_pushout_left_pushout_inr_iso_hom CategoryTheory.Limits.inr_inl_pushoutLeftPushoutInrIso_hom end section PushoutAssoc variable {X₁ X₂ X₃ Z₁ Z₂ : C} (g₁ : Z₁ ⟶ X₁) (g₂ : Z₁ ⟶ X₂) (g₃ : Z₂ ⟶ X₂) variable (g₄ : Z₂ ⟶ X₃) [HasPushout g₁ g₂] [HasPushout g₃ g₄] local notation "Y₁" => pushout g₁ g₂ local notation "Y₂" => pushout g₃ g₄ local notation "f₁" => (pushout.inl : X₁ ⟶ Y₁) local notation "f₂" => (pushout.inr : X₂ ⟶ Y₁) local notation "f₃" => (pushout.inl : X₂ ⟶ Y₂) local notation "f₄" => (pushout.inr : X₃ ⟶ Y₂) local notation "W" => pushout g₁ (g₂ ≫ f₃) local notation "W'" => pushout (g₃ ≫ f₂) g₄ local notation "l₁" => (pushout.desc pushout.inl (f₃ ≫ pushout.inr) (pushout.condition.trans (Category.assoc _ _ _)) : Y₁ ⟶ W) local notation "l₂" => (pushout.inr : Y₂ ⟶ W) local notation "l₁'" => (pushout.inl : Y₁ ⟶ W') local notation "l₂'" => (pushout.desc (f₂ ≫ pushout.inl) pushout.inr (Eq.trans (Eq.symm (Category.assoc _ _ _)) pushout.condition) : Y₂ ⟶ W') def pushoutPushoutLeftIsPushout [HasPushout (g₃ ≫ f₂) g₄] : IsColimit (PushoutCocone.mk l₁' l₂' (show f₂ ≫ l₁' = f₃ ≫ l₂' from (pushout.inl_desc _ _ _).symm)) := by apply PushoutCocone.isColimitOfFlip apply rightSquareIsPushout · apply PushoutCocone.isColimitOfFlip exact pushoutIsPushout g₃ g₄ · exact IsColimit.ofIsoColimit (PushoutCocone.flipIsColimit (pushoutIsPushout (g₃ ≫ f₂) g₄)) (PushoutCocone.ext (Iso.refl _) (by simp) (by simp)) · exact pushout.condition.symm #align category_theory.limits.pushout_pushout_left_is_pushout CategoryTheory.Limits.pushoutPushoutLeftIsPushout def pushoutAssocIsPushout [HasPushout (g₃ ≫ f₂) g₄] : IsColimit (PushoutCocone.mk (f₁ ≫ l₁') l₂' (show g₁ ≫ f₁ ≫ l₁' = (g₂ ≫ f₃) ≫ l₂' by rw [Category.assoc, pushout.inl_desc, pushout.condition_assoc])) := by apply bigSquareIsPushout · apply pushoutPushoutLeftIsPushout · exact pushoutIsPushout _ _ #align category_theory.limits.pushout_assoc_is_pushout CategoryTheory.Limits.pushoutAssocIsPushout theorem hasPushout_assoc [HasPushout (g₃ ≫ f₂) g₄] : HasPushout g₁ (g₂ ≫ f₃) := ⟨⟨⟨_, pushoutAssocIsPushout g₁ g₂ g₃ g₄⟩⟩⟩ #align category_theory.limits.has_pushout_assoc CategoryTheory.Limits.hasPushout_assoc def pushoutPushoutRightIsPushout [HasPushout g₁ (g₂ ≫ f₃)] : IsColimit (PushoutCocone.mk l₁ l₂ (show f₂ ≫ l₁ = f₃ ≫ l₂ from pushout.inr_desc _ _ _)) := by apply rightSquareIsPushout · exact pushoutIsPushout _ _ · convert pushoutIsPushout g₁ (g₂ ≫ f₃) rw [pushout.inl_desc] #align category_theory.limits.pushout_pushout_right_is_pushout CategoryTheory.Limits.pushoutPushoutRightIsPushout def pushoutAssocSymmIsPushout [HasPushout g₁ (g₂ ≫ f₃)] : IsColimit (PushoutCocone.mk l₁ (f₄ ≫ l₂) (show (g₃ ≫ f₂) ≫ l₁ = g₄ ≫ f₄ ≫ l₂ by rw [Category.assoc, pushout.inr_desc, pushout.condition_assoc])) := by apply PushoutCocone.isColimitOfFlip apply bigSquareIsPushout · apply PushoutCocone.isColimitOfFlip apply pushoutPushoutRightIsPushout · apply PushoutCocone.isColimitOfFlip exact pushoutIsPushout g₃ g₄ · exact pushout.condition.symm · exact (pushout.inr_desc _ _ _).symm #align category_theory.limits.pushout_assoc_symm_is_pushout CategoryTheory.Limits.pushoutAssocSymmIsPushout theorem hasPushout_assoc_symm [HasPushout g₁ (g₂ ≫ f₃)] : HasPushout (g₃ ≫ f₂) g₄ := ⟨⟨⟨_, pushoutAssocSymmIsPushout g₁ g₂ g₃ g₄⟩⟩⟩ #align category_theory.limits.has_pushout_assoc_symm CategoryTheory.Limits.hasPushout_assoc_symm -- Porting note: these are not propagating so moved into statements -- variable [HasPushout (g₃ ≫ f₂) g₄] [HasPushout g₁ (g₂ ≫ f₃)] noncomputable def pushoutAssoc [HasPushout (g₃ ≫ (pushout.inr : X₂ ⟶ Y₁)) g₄] [HasPushout g₁ (g₂ ≫ (pushout.inl : X₂ ⟶ Y₂))] : pushout (g₃ ≫ pushout.inr : _ ⟶ pushout g₁ g₂) g₄ ≅ pushout g₁ (g₂ ≫ pushout.inl : _ ⟶ pushout g₃ g₄) := (pushoutPushoutLeftIsPushout g₁ g₂ g₃ g₄).coconePointUniqueUpToIso (pushoutPushoutRightIsPushout g₁ g₂ g₃ g₄) #align category_theory.limits.pushout_assoc CategoryTheory.Limits.pushoutAssoc @[reassoc (attr := simp)] theorem inl_inl_pushoutAssoc_hom [HasPushout (g₃ ≫ (pushout.inr : X₂ ⟶ Y₁)) g₄] [HasPushout g₁ (g₂ ≫ (pushout.inl : X₂ ⟶ Y₂))] : pushout.inl ≫ pushout.inl ≫ (pushoutAssoc g₁ g₂ g₃ g₄).hom = pushout.inl := by trans f₁ ≫ l₁ · congr 1 exact (pushoutPushoutLeftIsPushout g₁ g₂ g₃ g₄).comp_coconePointUniqueUpToIso_hom _ WalkingCospan.left · exact pushout.inl_desc _ _ _ #align category_theory.limits.inl_inl_pushout_assoc_hom CategoryTheory.Limits.inl_inl_pushoutAssoc_hom @[reassoc (attr := simp)] theorem inr_inl_pushoutAssoc_hom [HasPushout (g₃ ≫ (pushout.inr : X₂ ⟶ Y₁)) g₄] [HasPushout g₁ (g₂ ≫ (pushout.inl : X₂ ⟶ Y₂))] : pushout.inr ≫ pushout.inl ≫ (pushoutAssoc g₁ g₂ g₃ g₄).hom = pushout.inl ≫ pushout.inr := by trans f₂ ≫ l₁ · congr 1 exact (pushoutPushoutLeftIsPushout g₁ g₂ g₃ g₄).comp_coconePointUniqueUpToIso_hom _ WalkingCospan.left · exact pushout.inr_desc _ _ _ #align category_theory.limits.inr_inl_pushout_assoc_hom CategoryTheory.Limits.inr_inl_pushoutAssoc_hom @[reassoc (attr := simp)]	Mathlib/CategoryTheory/Limits/Shapes/Pullbacks.lean	2,644	2,652	theorem inr_inr_pushoutAssoc_inv [HasPushout (g₃ ≫ (pushout.inr : X₂ ⟶ Y₁)) g₄] [HasPushout g₁ (g₂ ≫ (pushout.inl : X₂ ⟶ Y₂))] : pushout.inr ≫ pushout.inr ≫ (pushoutAssoc g₁ g₂ g₃ g₄).inv = pushout.inr := by	trans f₄ ≫ l₂' · congr 1 exact (pushoutPushoutLeftIsPushout g₁ g₂ g₃ g₄).comp_coconePointUniqueUpToIso_inv (pushoutPushoutRightIsPushout g₁ g₂ g₃ g₄) WalkingCospan.right · exact pushout.inr_desc _ _ _
import Mathlib.Algebra.Polynomial.AlgebraMap import Mathlib.Algebra.Polynomial.BigOperators import Mathlib.Algebra.Polynomial.Degree.Lemmas import Mathlib.Algebra.Polynomial.Div #align_import data.polynomial.ring_division from "leanprover-community/mathlib"@"8efcf8022aac8e01df8d302dcebdbc25d6a886c8" noncomputable section open Polynomial open Finset namespace Polynomial universe u v w z variable {R : Type u} {S : Type v} {T : Type w} {a b : R} {n : ℕ} section NoZeroDivisors variable [Semiring R] [NoZeroDivisors R] {p q : R[X]} instance : NoZeroDivisors R[X] where eq_zero_or_eq_zero_of_mul_eq_zero h := by rw [← leadingCoeff_eq_zero, ← leadingCoeff_eq_zero] refine eq_zero_or_eq_zero_of_mul_eq_zero ?_ rw [← leadingCoeff_zero, ← leadingCoeff_mul, h] theorem natDegree_mul (hp : p ≠ 0) (hq : q ≠ 0) : (pq).natDegree = p.natDegree + q.natDegree := by rw [← Nat.cast_inj (R := WithBot ℕ), ← degree_eq_natDegree (mul_ne_zero hp hq), Nat.cast_add, ← degree_eq_natDegree hp, ← degree_eq_natDegree hq, degree_mul] #align polynomial.nat_degree_mul Polynomial.natDegree_mul theorem trailingDegree_mul : (p q).trailingDegree = p.trailingDegree + q.trailingDegree := by by_cases hp : p = 0 · rw [hp, zero_mul, trailingDegree_zero, top_add] by_cases hq : q = 0 · rw [hq, mul_zero, trailingDegree_zero, add_top] · rw [trailingDegree_eq_natTrailingDegree hp, trailingDegree_eq_natTrailingDegree hq, trailingDegree_eq_natTrailingDegree (mul_ne_zero hp hq), natTrailingDegree_mul hp hq] apply WithTop.coe_add #align polynomial.trailing_degree_mul Polynomial.trailingDegree_mul @[simp] theorem natDegree_pow (p : R[X]) (n : ℕ) : natDegree (p ^ n) = n * natDegree p := by classical obtain rfl \| hp := eq_or_ne p 0 · obtain rfl \| hn := eq_or_ne n 0 <;> simp [] exact natDegree_pow' $ by rw [← leadingCoeff_pow, Ne, leadingCoeff_eq_zero]; exact pow_ne_zero _ hp #align polynomial.nat_degree_pow Polynomial.natDegree_pow theorem degree_le_mul_left (p : R[X]) (hq : q ≠ 0) : degree p ≤ degree (p q) := by classical exact if hp : p = 0 then by simp only [hp, zero_mul, le_refl] else by rw [degree_mul, degree_eq_natDegree hp, degree_eq_natDegree hq]; exact WithBot.coe_le_coe.2 (Nat.le_add_right _ _) #align polynomial.degree_le_mul_left Polynomial.degree_le_mul_left theorem natDegree_le_of_dvd {p q : R[X]} (h1 : p ∣ q) (h2 : q ≠ 0) : p.natDegree ≤ q.natDegree := by rcases h1 with ⟨q, rfl⟩; rw [mul_ne_zero_iff] at h2 rw [natDegree_mul h2.1 h2.2]; exact Nat.le_add_right _ _ #align polynomial.nat_degree_le_of_dvd Polynomial.natDegree_le_of_dvd theorem degree_le_of_dvd {p q : R[X]} (h1 : p ∣ q) (h2 : q ≠ 0) : degree p ≤ degree q := by rcases h1 with ⟨q, rfl⟩; rw [mul_ne_zero_iff] at h2 exact degree_le_mul_left p h2.2 #align polynomial.degree_le_of_dvd Polynomial.degree_le_of_dvd theorem eq_zero_of_dvd_of_degree_lt {p q : R[X]} (h₁ : p ∣ q) (h₂ : degree q < degree p) : q = 0 := by by_contra hc exact (lt_iff_not_ge _ _).mp h₂ (degree_le_of_dvd h₁ hc) #align polynomial.eq_zero_of_dvd_of_degree_lt Polynomial.eq_zero_of_dvd_of_degree_lt	Mathlib/Algebra/Polynomial/RingDivision.lean	172	175	theorem eq_zero_of_dvd_of_natDegree_lt {p q : R[X]} (h₁ : p ∣ q) (h₂ : natDegree q < natDegree p) : q = 0 := by	by_contra hc exact (lt_iff_not_ge _ _).mp h₂ (natDegree_le_of_dvd h₁ hc)
import Mathlib.CategoryTheory.Comma.Over import Mathlib.CategoryTheory.DiscreteCategory import Mathlib.CategoryTheory.EpiMono import Mathlib.CategoryTheory.Limits.Shapes.Terminal #align_import category_theory.limits.shapes.binary_products from "leanprover-community/mathlib"@"fec1d95fc61c750c1ddbb5b1f7f48b8e811a80d7" noncomputable section universe v u u₂ open CategoryTheory namespace CategoryTheory.Limits inductive WalkingPair : Type \| left \| right deriving DecidableEq, Inhabited #align category_theory.limits.walking_pair CategoryTheory.Limits.WalkingPair open WalkingPair def WalkingPair.swap : WalkingPair ≃ WalkingPair where toFun j := WalkingPair.recOn j right left invFun j := WalkingPair.recOn j right left left_inv j := by cases j; repeat rfl right_inv j := by cases j; repeat rfl #align category_theory.limits.walking_pair.swap CategoryTheory.Limits.WalkingPair.swap @[simp] theorem WalkingPair.swap_apply_left : WalkingPair.swap left = right := rfl #align category_theory.limits.walking_pair.swap_apply_left CategoryTheory.Limits.WalkingPair.swap_apply_left @[simp] theorem WalkingPair.swap_apply_right : WalkingPair.swap right = left := rfl #align category_theory.limits.walking_pair.swap_apply_right CategoryTheory.Limits.WalkingPair.swap_apply_right @[simp] theorem WalkingPair.swap_symm_apply_tt : WalkingPair.swap.symm left = right := rfl #align category_theory.limits.walking_pair.swap_symm_apply_tt CategoryTheory.Limits.WalkingPair.swap_symm_apply_tt @[simp] theorem WalkingPair.swap_symm_apply_ff : WalkingPair.swap.symm right = left := rfl #align category_theory.limits.walking_pair.swap_symm_apply_ff CategoryTheory.Limits.WalkingPair.swap_symm_apply_ff def WalkingPair.equivBool : WalkingPair ≃ Bool where toFun j := WalkingPair.recOn j true false -- to match equiv.sum_equiv_sigma_bool invFun b := Bool.recOn b right left left_inv j := by cases j; repeat rfl right_inv b := by cases b; repeat rfl #align category_theory.limits.walking_pair.equiv_bool CategoryTheory.Limits.WalkingPair.equivBool @[simp] theorem WalkingPair.equivBool_apply_left : WalkingPair.equivBool left = true := rfl #align category_theory.limits.walking_pair.equiv_bool_apply_left CategoryTheory.Limits.WalkingPair.equivBool_apply_left @[simp] theorem WalkingPair.equivBool_apply_right : WalkingPair.equivBool right = false := rfl #align category_theory.limits.walking_pair.equiv_bool_apply_right CategoryTheory.Limits.WalkingPair.equivBool_apply_right @[simp] theorem WalkingPair.equivBool_symm_apply_true : WalkingPair.equivBool.symm true = left := rfl #align category_theory.limits.walking_pair.equiv_bool_symm_apply_tt CategoryTheory.Limits.WalkingPair.equivBool_symm_apply_true @[simp] theorem WalkingPair.equivBool_symm_apply_false : WalkingPair.equivBool.symm false = right := rfl #align category_theory.limits.walking_pair.equiv_bool_symm_apply_ff CategoryTheory.Limits.WalkingPair.equivBool_symm_apply_false variable {C : Type u} def pairFunction (X Y : C) : WalkingPair → C := fun j => WalkingPair.casesOn j X Y #align category_theory.limits.pair_function CategoryTheory.Limits.pairFunction @[simp] theorem pairFunction_left (X Y : C) : pairFunction X Y left = X := rfl #align category_theory.limits.pair_function_left CategoryTheory.Limits.pairFunction_left @[simp] theorem pairFunction_right (X Y : C) : pairFunction X Y right = Y := rfl #align category_theory.limits.pair_function_right CategoryTheory.Limits.pairFunction_right variable [Category.{v} C] def pair (X Y : C) : Discrete WalkingPair ⥤ C := Discrete.functor fun j => WalkingPair.casesOn j X Y #align category_theory.limits.pair CategoryTheory.Limits.pair @[simp] theorem pair_obj_left (X Y : C) : (pair X Y).obj ⟨left⟩ = X := rfl #align category_theory.limits.pair_obj_left CategoryTheory.Limits.pair_obj_left @[simp] theorem pair_obj_right (X Y : C) : (pair X Y).obj ⟨right⟩ = Y := rfl #align category_theory.limits.pair_obj_right CategoryTheory.Limits.pair_obj_right section variable {F G : Discrete WalkingPair ⥤ C} (f : F.obj ⟨left⟩ ⟶ G.obj ⟨left⟩) (g : F.obj ⟨right⟩ ⟶ G.obj ⟨right⟩) attribute [local aesop safe tactic (rule_sets := [CategoryTheory])] CategoryTheory.Discrete.discreteCases def mapPair : F ⟶ G where app j := Discrete.recOn j fun j => WalkingPair.casesOn j f g naturality := fun ⟨X⟩ ⟨Y⟩ ⟨⟨u⟩⟩ => by aesop_cat #align category_theory.limits.map_pair CategoryTheory.Limits.mapPair @[simp] theorem mapPair_left : (mapPair f g).app ⟨left⟩ = f := rfl #align category_theory.limits.map_pair_left CategoryTheory.Limits.mapPair_left @[simp] theorem mapPair_right : (mapPair f g).app ⟨right⟩ = g := rfl #align category_theory.limits.map_pair_right CategoryTheory.Limits.mapPair_right @[simps!] def mapPairIso (f : F.obj ⟨left⟩ ≅ G.obj ⟨left⟩) (g : F.obj ⟨right⟩ ≅ G.obj ⟨right⟩) : F ≅ G := NatIso.ofComponents (fun j => Discrete.recOn j fun j => WalkingPair.casesOn j f g) (fun ⟨⟨u⟩⟩ => by aesop_cat) #align category_theory.limits.map_pair_iso CategoryTheory.Limits.mapPairIso end @[simps!] def diagramIsoPair (F : Discrete WalkingPair ⥤ C) : F ≅ pair (F.obj ⟨WalkingPair.left⟩) (F.obj ⟨WalkingPair.right⟩) := mapPairIso (Iso.refl _) (Iso.refl _) #align category_theory.limits.diagram_iso_pair CategoryTheory.Limits.diagramIsoPair section variable {D : Type u} [Category.{v} D] def pairComp (X Y : C) (F : C ⥤ D) : pair X Y ⋙ F ≅ pair (F.obj X) (F.obj Y) := diagramIsoPair _ #align category_theory.limits.pair_comp CategoryTheory.Limits.pairComp end abbrev BinaryFan (X Y : C) := Cone (pair X Y) #align category_theory.limits.binary_fan CategoryTheory.Limits.BinaryFan abbrev BinaryFan.fst {X Y : C} (s : BinaryFan X Y) := s.π.app ⟨WalkingPair.left⟩ #align category_theory.limits.binary_fan.fst CategoryTheory.Limits.BinaryFan.fst abbrev BinaryFan.snd {X Y : C} (s : BinaryFan X Y) := s.π.app ⟨WalkingPair.right⟩ #align category_theory.limits.binary_fan.snd CategoryTheory.Limits.BinaryFan.snd @[simp] theorem BinaryFan.π_app_left {X Y : C} (s : BinaryFan X Y) : s.π.app ⟨WalkingPair.left⟩ = s.fst := rfl #align category_theory.limits.binary_fan.π_app_left CategoryTheory.Limits.BinaryFan.π_app_left @[simp] theorem BinaryFan.π_app_right {X Y : C} (s : BinaryFan X Y) : s.π.app ⟨WalkingPair.right⟩ = s.snd := rfl #align category_theory.limits.binary_fan.π_app_right CategoryTheory.Limits.BinaryFan.π_app_right def BinaryFan.IsLimit.mk {X Y : C} (s : BinaryFan X Y) (lift : ∀ {T : C} (_ : T ⟶ X) (_ : T ⟶ Y), T ⟶ s.pt) (hl₁ : ∀ {T : C} (f : T ⟶ X) (g : T ⟶ Y), lift f g ≫ s.fst = f) (hl₂ : ∀ {T : C} (f : T ⟶ X) (g : T ⟶ Y), lift f g ≫ s.snd = g) (uniq : ∀ {T : C} (f : T ⟶ X) (g : T ⟶ Y) (m : T ⟶ s.pt) (_ : m ≫ s.fst = f) (_ : m ≫ s.snd = g), m = lift f g) : IsLimit s := Limits.IsLimit.mk (fun t => lift (BinaryFan.fst t) (BinaryFan.snd t)) (by rintro t (rfl \| rfl) · exact hl₁ _ _ · exact hl₂ _ _) fun t m h => uniq _ _ _ (h ⟨WalkingPair.left⟩) (h ⟨WalkingPair.right⟩) #align category_theory.limits.binary_fan.is_limit.mk CategoryTheory.Limits.BinaryFan.IsLimit.mk theorem BinaryFan.IsLimit.hom_ext {W X Y : C} {s : BinaryFan X Y} (h : IsLimit s) {f g : W ⟶ s.pt} (h₁ : f ≫ s.fst = g ≫ s.fst) (h₂ : f ≫ s.snd = g ≫ s.snd) : f = g := h.hom_ext fun j => Discrete.recOn j fun j => WalkingPair.casesOn j h₁ h₂ #align category_theory.limits.binary_fan.is_limit.hom_ext CategoryTheory.Limits.BinaryFan.IsLimit.hom_ext abbrev BinaryCofan (X Y : C) := Cocone (pair X Y) #align category_theory.limits.binary_cofan CategoryTheory.Limits.BinaryCofan abbrev BinaryCofan.inl {X Y : C} (s : BinaryCofan X Y) := s.ι.app ⟨WalkingPair.left⟩ #align category_theory.limits.binary_cofan.inl CategoryTheory.Limits.BinaryCofan.inl abbrev BinaryCofan.inr {X Y : C} (s : BinaryCofan X Y) := s.ι.app ⟨WalkingPair.right⟩ #align category_theory.limits.binary_cofan.inr CategoryTheory.Limits.BinaryCofan.inr @[simp] theorem BinaryCofan.ι_app_left {X Y : C} (s : BinaryCofan X Y) : s.ι.app ⟨WalkingPair.left⟩ = s.inl := rfl #align category_theory.limits.binary_cofan.ι_app_left CategoryTheory.Limits.BinaryCofan.ι_app_left @[simp] theorem BinaryCofan.ι_app_right {X Y : C} (s : BinaryCofan X Y) : s.ι.app ⟨WalkingPair.right⟩ = s.inr := rfl #align category_theory.limits.binary_cofan.ι_app_right CategoryTheory.Limits.BinaryCofan.ι_app_right def BinaryCofan.IsColimit.mk {X Y : C} (s : BinaryCofan X Y) (desc : ∀ {T : C} (_ : X ⟶ T) (_ : Y ⟶ T), s.pt ⟶ T) (hd₁ : ∀ {T : C} (f : X ⟶ T) (g : Y ⟶ T), s.inl ≫ desc f g = f) (hd₂ : ∀ {T : C} (f : X ⟶ T) (g : Y ⟶ T), s.inr ≫ desc f g = g) (uniq : ∀ {T : C} (f : X ⟶ T) (g : Y ⟶ T) (m : s.pt ⟶ T) (_ : s.inl ≫ m = f) (_ : s.inr ≫ m = g), m = desc f g) : IsColimit s := Limits.IsColimit.mk (fun t => desc (BinaryCofan.inl t) (BinaryCofan.inr t)) (by rintro t (rfl \| rfl) · exact hd₁ _ _ · exact hd₂ _ _) fun t m h => uniq _ _ _ (h ⟨WalkingPair.left⟩) (h ⟨WalkingPair.right⟩) #align category_theory.limits.binary_cofan.is_colimit.mk CategoryTheory.Limits.BinaryCofan.IsColimit.mk theorem BinaryCofan.IsColimit.hom_ext {W X Y : C} {s : BinaryCofan X Y} (h : IsColimit s) {f g : s.pt ⟶ W} (h₁ : s.inl ≫ f = s.inl ≫ g) (h₂ : s.inr ≫ f = s.inr ≫ g) : f = g := h.hom_ext fun j => Discrete.recOn j fun j => WalkingPair.casesOn j h₁ h₂ #align category_theory.limits.binary_cofan.is_colimit.hom_ext CategoryTheory.Limits.BinaryCofan.IsColimit.hom_ext variable {X Y : C} section attribute [local aesop safe tactic (rule_sets := [CategoryTheory])] CategoryTheory.Discrete.discreteCases -- Porting note: would it be okay to use this more generally? attribute [local aesop safe cases (rule_sets := [CategoryTheory])] Eq @[simps pt] def BinaryFan.mk {P : C} (π₁ : P ⟶ X) (π₂ : P ⟶ Y) : BinaryFan X Y where pt := P π := { app := fun ⟨j⟩ => by cases j <;> simpa } #align category_theory.limits.binary_fan.mk CategoryTheory.Limits.BinaryFan.mk @[simps pt] def BinaryCofan.mk {P : C} (ι₁ : X ⟶ P) (ι₂ : Y ⟶ P) : BinaryCofan X Y where pt := P ι := { app := fun ⟨j⟩ => by cases j <;> simpa } #align category_theory.limits.binary_cofan.mk CategoryTheory.Limits.BinaryCofan.mk end @[simp] theorem BinaryFan.mk_fst {P : C} (π₁ : P ⟶ X) (π₂ : P ⟶ Y) : (BinaryFan.mk π₁ π₂).fst = π₁ := rfl #align category_theory.limits.binary_fan.mk_fst CategoryTheory.Limits.BinaryFan.mk_fst @[simp] theorem BinaryFan.mk_snd {P : C} (π₁ : P ⟶ X) (π₂ : P ⟶ Y) : (BinaryFan.mk π₁ π₂).snd = π₂ := rfl #align category_theory.limits.binary_fan.mk_snd CategoryTheory.Limits.BinaryFan.mk_snd @[simp] theorem BinaryCofan.mk_inl {P : C} (ι₁ : X ⟶ P) (ι₂ : Y ⟶ P) : (BinaryCofan.mk ι₁ ι₂).inl = ι₁ := rfl #align category_theory.limits.binary_cofan.mk_inl CategoryTheory.Limits.BinaryCofan.mk_inl @[simp] theorem BinaryCofan.mk_inr {P : C} (ι₁ : X ⟶ P) (ι₂ : Y ⟶ P) : (BinaryCofan.mk ι₁ ι₂).inr = ι₂ := rfl #align category_theory.limits.binary_cofan.mk_inr CategoryTheory.Limits.BinaryCofan.mk_inr def isoBinaryFanMk {X Y : C} (c : BinaryFan X Y) : c ≅ BinaryFan.mk c.fst c.snd := Cones.ext (Iso.refl _) fun j => by cases' j with l; cases l; repeat simp #align category_theory.limits.iso_binary_fan_mk CategoryTheory.Limits.isoBinaryFanMk def isoBinaryCofanMk {X Y : C} (c : BinaryCofan X Y) : c ≅ BinaryCofan.mk c.inl c.inr := Cocones.ext (Iso.refl _) fun j => by cases' j with l; cases l; repeat simp #align category_theory.limits.iso_binary_cofan_mk CategoryTheory.Limits.isoBinaryCofanMk def BinaryFan.isLimitMk {W : C} {fst : W ⟶ X} {snd : W ⟶ Y} (lift : ∀ s : BinaryFan X Y, s.pt ⟶ W) (fac_left : ∀ s : BinaryFan X Y, lift s ≫ fst = s.fst) (fac_right : ∀ s : BinaryFan X Y, lift s ≫ snd = s.snd) (uniq : ∀ (s : BinaryFan X Y) (m : s.pt ⟶ W) (_ : m ≫ fst = s.fst) (_ : m ≫ snd = s.snd), m = lift s) : IsLimit (BinaryFan.mk fst snd) := { lift := lift fac := fun s j => by rcases j with ⟨⟨⟩⟩ exacts [fac_left s, fac_right s] uniq := fun s m w => uniq s m (w ⟨WalkingPair.left⟩) (w ⟨WalkingPair.right⟩) } #align category_theory.limits.binary_fan.is_limit_mk CategoryTheory.Limits.BinaryFan.isLimitMk def BinaryCofan.isColimitMk {W : C} {inl : X ⟶ W} {inr : Y ⟶ W} (desc : ∀ s : BinaryCofan X Y, W ⟶ s.pt) (fac_left : ∀ s : BinaryCofan X Y, inl ≫ desc s = s.inl) (fac_right : ∀ s : BinaryCofan X Y, inr ≫ desc s = s.inr) (uniq : ∀ (s : BinaryCofan X Y) (m : W ⟶ s.pt) (_ : inl ≫ m = s.inl) (_ : inr ≫ m = s.inr), m = desc s) : IsColimit (BinaryCofan.mk inl inr) := { desc := desc fac := fun s j => by rcases j with ⟨⟨⟩⟩ exacts [fac_left s, fac_right s] uniq := fun s m w => uniq s m (w ⟨WalkingPair.left⟩) (w ⟨WalkingPair.right⟩) } #align category_theory.limits.binary_cofan.is_colimit_mk CategoryTheory.Limits.BinaryCofan.isColimitMk @[simps] def BinaryFan.IsLimit.lift' {W X Y : C} {s : BinaryFan X Y} (h : IsLimit s) (f : W ⟶ X) (g : W ⟶ Y) : { l : W ⟶ s.pt // l ≫ s.fst = f ∧ l ≫ s.snd = g } := ⟨h.lift <\| BinaryFan.mk f g, h.fac _ _, h.fac _ _⟩ #align category_theory.limits.binary_fan.is_limit.lift' CategoryTheory.Limits.BinaryFan.IsLimit.lift' @[simps] def BinaryCofan.IsColimit.desc' {W X Y : C} {s : BinaryCofan X Y} (h : IsColimit s) (f : X ⟶ W) (g : Y ⟶ W) : { l : s.pt ⟶ W // s.inl ≫ l = f ∧ s.inr ≫ l = g } := ⟨h.desc <\| BinaryCofan.mk f g, h.fac _ _, h.fac _ _⟩ #align category_theory.limits.binary_cofan.is_colimit.desc' CategoryTheory.Limits.BinaryCofan.IsColimit.desc' def BinaryFan.isLimitFlip {X Y : C} {c : BinaryFan X Y} (hc : IsLimit c) : IsLimit (BinaryFan.mk c.snd c.fst) := BinaryFan.isLimitMk (fun s => hc.lift (BinaryFan.mk s.snd s.fst)) (fun _ => hc.fac _ _) (fun _ => hc.fac _ _) fun s _ e₁ e₂ => BinaryFan.IsLimit.hom_ext hc (e₂.trans (hc.fac (BinaryFan.mk s.snd s.fst) ⟨WalkingPair.left⟩).symm) (e₁.trans (hc.fac (BinaryFan.mk s.snd s.fst) ⟨WalkingPair.right⟩).symm) #align category_theory.limits.binary_fan.is_limit_flip CategoryTheory.Limits.BinaryFan.isLimitFlip theorem BinaryFan.isLimit_iff_isIso_fst {X Y : C} (h : IsTerminal Y) (c : BinaryFan X Y) : Nonempty (IsLimit c) ↔ IsIso c.fst := by constructor · rintro ⟨H⟩ obtain ⟨l, hl, -⟩ := BinaryFan.IsLimit.lift' H (𝟙 X) (h.from X) exact ⟨⟨l, BinaryFan.IsLimit.hom_ext H (by simpa [hl, -Category.comp_id] using Category.comp_id _) (h.hom_ext _ _), hl⟩⟩ · intro exact ⟨BinaryFan.IsLimit.mk _ (fun f _ => f ≫ inv c.fst) (fun _ _ => by simp) (fun _ _ => h.hom_ext _ _) fun _ _ _ e _ => by simp [← e]⟩ #align category_theory.limits.binary_fan.is_limit_iff_is_iso_fst CategoryTheory.Limits.BinaryFan.isLimit_iff_isIso_fst theorem BinaryFan.isLimit_iff_isIso_snd {X Y : C} (h : IsTerminal X) (c : BinaryFan X Y) : Nonempty (IsLimit c) ↔ IsIso c.snd := by refine Iff.trans ?_ (BinaryFan.isLimit_iff_isIso_fst h (BinaryFan.mk c.snd c.fst)) exact ⟨fun h => ⟨BinaryFan.isLimitFlip h.some⟩, fun h => ⟨(BinaryFan.isLimitFlip h.some).ofIsoLimit (isoBinaryFanMk c).symm⟩⟩ #align category_theory.limits.binary_fan.is_limit_iff_is_iso_snd CategoryTheory.Limits.BinaryFan.isLimit_iff_isIso_snd noncomputable def BinaryFan.isLimitCompLeftIso {X Y X' : C} (c : BinaryFan X Y) (f : X ⟶ X') [IsIso f] (h : IsLimit c) : IsLimit (BinaryFan.mk (c.fst ≫ f) c.snd) := by fapply BinaryFan.isLimitMk · exact fun s => h.lift (BinaryFan.mk (s.fst ≫ inv f) s.snd) · intro s -- Porting note: simp timed out here simp only [Category.comp_id,BinaryFan.π_app_left,IsIso.inv_hom_id, BinaryFan.mk_fst,IsLimit.fac_assoc,eq_self_iff_true,Category.assoc] · intro s -- Porting note: simp timed out here simp only [BinaryFan.π_app_right,BinaryFan.mk_snd,eq_self_iff_true,IsLimit.fac] · intro s m e₁ e₂ -- Porting note: simpa timed out here also apply BinaryFan.IsLimit.hom_ext h · simpa only [BinaryFan.π_app_left,BinaryFan.mk_fst,Category.assoc,IsLimit.fac,IsIso.eq_comp_inv] · simpa only [BinaryFan.π_app_right,BinaryFan.mk_snd,IsLimit.fac] #align category_theory.limits.binary_fan.is_limit_comp_left_iso CategoryTheory.Limits.BinaryFan.isLimitCompLeftIso noncomputable def BinaryFan.isLimitCompRightIso {X Y Y' : C} (c : BinaryFan X Y) (f : Y ⟶ Y') [IsIso f] (h : IsLimit c) : IsLimit (BinaryFan.mk c.fst (c.snd ≫ f)) := BinaryFan.isLimitFlip <\| BinaryFan.isLimitCompLeftIso _ f (BinaryFan.isLimitFlip h) #align category_theory.limits.binary_fan.is_limit_comp_right_iso CategoryTheory.Limits.BinaryFan.isLimitCompRightIso def BinaryCofan.isColimitFlip {X Y : C} {c : BinaryCofan X Y} (hc : IsColimit c) : IsColimit (BinaryCofan.mk c.inr c.inl) := BinaryCofan.isColimitMk (fun s => hc.desc (BinaryCofan.mk s.inr s.inl)) (fun _ => hc.fac _ _) (fun _ => hc.fac _ _) fun s _ e₁ e₂ => BinaryCofan.IsColimit.hom_ext hc (e₂.trans (hc.fac (BinaryCofan.mk s.inr s.inl) ⟨WalkingPair.left⟩).symm) (e₁.trans (hc.fac (BinaryCofan.mk s.inr s.inl) ⟨WalkingPair.right⟩).symm) #align category_theory.limits.binary_cofan.is_colimit_flip CategoryTheory.Limits.BinaryCofan.isColimitFlip theorem BinaryCofan.isColimit_iff_isIso_inl {X Y : C} (h : IsInitial Y) (c : BinaryCofan X Y) : Nonempty (IsColimit c) ↔ IsIso c.inl := by constructor · rintro ⟨H⟩ obtain ⟨l, hl, -⟩ := BinaryCofan.IsColimit.desc' H (𝟙 X) (h.to X) refine ⟨⟨l, hl, BinaryCofan.IsColimit.hom_ext H (?_) (h.hom_ext _ _)⟩⟩ rw [Category.comp_id] have e : (inl c ≫ l) ≫ inl c = 𝟙 X ≫ inl c := congrArg (·≫inl c) hl rwa [Category.assoc,Category.id_comp] at e · intro exact ⟨BinaryCofan.IsColimit.mk _ (fun f _ => inv c.inl ≫ f) (fun _ _ => IsIso.hom_inv_id_assoc _ _) (fun _ _ => h.hom_ext _ _) fun _ _ _ e _ => (IsIso.eq_inv_comp _).mpr e⟩ #align category_theory.limits.binary_cofan.is_colimit_iff_is_iso_inl CategoryTheory.Limits.BinaryCofan.isColimit_iff_isIso_inl theorem BinaryCofan.isColimit_iff_isIso_inr {X Y : C} (h : IsInitial X) (c : BinaryCofan X Y) : Nonempty (IsColimit c) ↔ IsIso c.inr := by refine Iff.trans ?_ (BinaryCofan.isColimit_iff_isIso_inl h (BinaryCofan.mk c.inr c.inl)) exact ⟨fun h => ⟨BinaryCofan.isColimitFlip h.some⟩, fun h => ⟨(BinaryCofan.isColimitFlip h.some).ofIsoColimit (isoBinaryCofanMk c).symm⟩⟩ #align category_theory.limits.binary_cofan.is_colimit_iff_is_iso_inr CategoryTheory.Limits.BinaryCofan.isColimit_iff_isIso_inr noncomputable def BinaryCofan.isColimitCompLeftIso {X Y X' : C} (c : BinaryCofan X Y) (f : X' ⟶ X) [IsIso f] (h : IsColimit c) : IsColimit (BinaryCofan.mk (f ≫ c.inl) c.inr) := by fapply BinaryCofan.isColimitMk · exact fun s => h.desc (BinaryCofan.mk (inv f ≫ s.inl) s.inr) · intro s -- Porting note: simp timed out here too simp only [IsColimit.fac,BinaryCofan.ι_app_left,eq_self_iff_true, Category.assoc,BinaryCofan.mk_inl,IsIso.hom_inv_id_assoc] · intro s -- Porting note: simp timed out here too simp only [IsColimit.fac,BinaryCofan.ι_app_right,eq_self_iff_true,BinaryCofan.mk_inr] · intro s m e₁ e₂ apply BinaryCofan.IsColimit.hom_ext h · rw [← cancel_epi f] -- Porting note: simp timed out here too simpa only [IsColimit.fac,BinaryCofan.ι_app_left,eq_self_iff_true, Category.assoc,BinaryCofan.mk_inl,IsIso.hom_inv_id_assoc] using e₁ -- Porting note: simp timed out here too · simpa only [IsColimit.fac,BinaryCofan.ι_app_right,eq_self_iff_true,BinaryCofan.mk_inr] #align category_theory.limits.binary_cofan.is_colimit_comp_left_iso CategoryTheory.Limits.BinaryCofan.isColimitCompLeftIso noncomputable def BinaryCofan.isColimitCompRightIso {X Y Y' : C} (c : BinaryCofan X Y) (f : Y' ⟶ Y) [IsIso f] (h : IsColimit c) : IsColimit (BinaryCofan.mk c.inl (f ≫ c.inr)) := BinaryCofan.isColimitFlip <\| BinaryCofan.isColimitCompLeftIso _ f (BinaryCofan.isColimitFlip h) #align category_theory.limits.binary_cofan.is_colimit_comp_right_iso CategoryTheory.Limits.BinaryCofan.isColimitCompRightIso abbrev HasBinaryProduct (X Y : C) := HasLimit (pair X Y) #align category_theory.limits.has_binary_product CategoryTheory.Limits.HasBinaryProduct abbrev HasBinaryCoproduct (X Y : C) := HasColimit (pair X Y) #align category_theory.limits.has_binary_coproduct CategoryTheory.Limits.HasBinaryCoproduct abbrev prod (X Y : C) [HasBinaryProduct X Y] := limit (pair X Y) #align category_theory.limits.prod CategoryTheory.Limits.prod abbrev coprod (X Y : C) [HasBinaryCoproduct X Y] := colimit (pair X Y) #align category_theory.limits.coprod CategoryTheory.Limits.coprod notation:20 X " ⨯ " Y:20 => prod X Y notation:20 X " ⨿ " Y:20 => coprod X Y abbrev prod.fst {X Y : C} [HasBinaryProduct X Y] : X ⨯ Y ⟶ X := limit.π (pair X Y) ⟨WalkingPair.left⟩ #align category_theory.limits.prod.fst CategoryTheory.Limits.prod.fst abbrev prod.snd {X Y : C} [HasBinaryProduct X Y] : X ⨯ Y ⟶ Y := limit.π (pair X Y) ⟨WalkingPair.right⟩ #align category_theory.limits.prod.snd CategoryTheory.Limits.prod.snd abbrev coprod.inl {X Y : C} [HasBinaryCoproduct X Y] : X ⟶ X ⨿ Y := colimit.ι (pair X Y) ⟨WalkingPair.left⟩ #align category_theory.limits.coprod.inl CategoryTheory.Limits.coprod.inl abbrev coprod.inr {X Y : C} [HasBinaryCoproduct X Y] : Y ⟶ X ⨿ Y := colimit.ι (pair X Y) ⟨WalkingPair.right⟩ #align category_theory.limits.coprod.inr CategoryTheory.Limits.coprod.inr def prodIsProd (X Y : C) [HasBinaryProduct X Y] : IsLimit (BinaryFan.mk (prod.fst : X ⨯ Y ⟶ X) prod.snd) := (limit.isLimit _).ofIsoLimit (Cones.ext (Iso.refl _) (fun ⟨u⟩ => by cases u · dsimp; simp only [Category.id_comp]; rfl · dsimp; simp only [Category.id_comp]; rfl )) #align category_theory.limits.prod_is_prod CategoryTheory.Limits.prodIsProd def coprodIsCoprod (X Y : C) [HasBinaryCoproduct X Y] : IsColimit (BinaryCofan.mk (coprod.inl : X ⟶ X ⨿ Y) coprod.inr) := (colimit.isColimit _).ofIsoColimit (Cocones.ext (Iso.refl _) (fun ⟨u⟩ => by cases u · dsimp; simp only [Category.comp_id] · dsimp; simp only [Category.comp_id] )) #align category_theory.limits.coprod_is_coprod CategoryTheory.Limits.coprodIsCoprod @[ext 1100] theorem prod.hom_ext {W X Y : C} [HasBinaryProduct X Y] {f g : W ⟶ X ⨯ Y} (h₁ : f ≫ prod.fst = g ≫ prod.fst) (h₂ : f ≫ prod.snd = g ≫ prod.snd) : f = g := BinaryFan.IsLimit.hom_ext (limit.isLimit _) h₁ h₂ #align category_theory.limits.prod.hom_ext CategoryTheory.Limits.prod.hom_ext @[ext 1100] theorem coprod.hom_ext {W X Y : C} [HasBinaryCoproduct X Y] {f g : X ⨿ Y ⟶ W} (h₁ : coprod.inl ≫ f = coprod.inl ≫ g) (h₂ : coprod.inr ≫ f = coprod.inr ≫ g) : f = g := BinaryCofan.IsColimit.hom_ext (colimit.isColimit _) h₁ h₂ #align category_theory.limits.coprod.hom_ext CategoryTheory.Limits.coprod.hom_ext abbrev prod.lift {W X Y : C} [HasBinaryProduct X Y] (f : W ⟶ X) (g : W ⟶ Y) : W ⟶ X ⨯ Y := limit.lift _ (BinaryFan.mk f g) #align category_theory.limits.prod.lift CategoryTheory.Limits.prod.lift abbrev diag (X : C) [HasBinaryProduct X X] : X ⟶ X ⨯ X := prod.lift (𝟙 _) (𝟙 _) #align category_theory.limits.diag CategoryTheory.Limits.diag abbrev coprod.desc {W X Y : C} [HasBinaryCoproduct X Y] (f : X ⟶ W) (g : Y ⟶ W) : X ⨿ Y ⟶ W := colimit.desc _ (BinaryCofan.mk f g) #align category_theory.limits.coprod.desc CategoryTheory.Limits.coprod.desc abbrev codiag (X : C) [HasBinaryCoproduct X X] : X ⨿ X ⟶ X := coprod.desc (𝟙 _) (𝟙 _) #align category_theory.limits.codiag CategoryTheory.Limits.codiag -- Porting note (#10618): simp removes as simp can prove this @[reassoc] theorem prod.lift_fst {W X Y : C} [HasBinaryProduct X Y] (f : W ⟶ X) (g : W ⟶ Y) : prod.lift f g ≫ prod.fst = f := limit.lift_π _ _ #align category_theory.limits.prod.lift_fst CategoryTheory.Limits.prod.lift_fst #align category_theory.limits.prod.lift_fst_assoc CategoryTheory.Limits.prod.lift_fst_assoc -- Porting note (#10618): simp removes as simp can prove this @[reassoc] theorem prod.lift_snd {W X Y : C} [HasBinaryProduct X Y] (f : W ⟶ X) (g : W ⟶ Y) : prod.lift f g ≫ prod.snd = g := limit.lift_π _ _ #align category_theory.limits.prod.lift_snd CategoryTheory.Limits.prod.lift_snd #align category_theory.limits.prod.lift_snd_assoc CategoryTheory.Limits.prod.lift_snd_assoc -- The simp linter says simp can prove the reassoc version of this lemma. -- Porting note: it can also prove the og version @[reassoc] theorem coprod.inl_desc {W X Y : C} [HasBinaryCoproduct X Y] (f : X ⟶ W) (g : Y ⟶ W) : coprod.inl ≫ coprod.desc f g = f := colimit.ι_desc _ _ #align category_theory.limits.coprod.inl_desc CategoryTheory.Limits.coprod.inl_desc #align category_theory.limits.coprod.inl_desc_assoc CategoryTheory.Limits.coprod.inl_desc_assoc -- The simp linter says simp can prove the reassoc version of this lemma. -- Porting note: it can also prove the og version @[reassoc] theorem coprod.inr_desc {W X Y : C} [HasBinaryCoproduct X Y] (f : X ⟶ W) (g : Y ⟶ W) : coprod.inr ≫ coprod.desc f g = g := colimit.ι_desc _ _ #align category_theory.limits.coprod.inr_desc CategoryTheory.Limits.coprod.inr_desc #align category_theory.limits.coprod.inr_desc_assoc CategoryTheory.Limits.coprod.inr_desc_assoc instance prod.mono_lift_of_mono_left {W X Y : C} [HasBinaryProduct X Y] (f : W ⟶ X) (g : W ⟶ Y) [Mono f] : Mono (prod.lift f g) := mono_of_mono_fac <\| prod.lift_fst _ _ #align category_theory.limits.prod.mono_lift_of_mono_left CategoryTheory.Limits.prod.mono_lift_of_mono_left instance prod.mono_lift_of_mono_right {W X Y : C} [HasBinaryProduct X Y] (f : W ⟶ X) (g : W ⟶ Y) [Mono g] : Mono (prod.lift f g) := mono_of_mono_fac <\| prod.lift_snd _ _ #align category_theory.limits.prod.mono_lift_of_mono_right CategoryTheory.Limits.prod.mono_lift_of_mono_right instance coprod.epi_desc_of_epi_left {W X Y : C} [HasBinaryCoproduct X Y] (f : X ⟶ W) (g : Y ⟶ W) [Epi f] : Epi (coprod.desc f g) := epi_of_epi_fac <\| coprod.inl_desc _ _ #align category_theory.limits.coprod.epi_desc_of_epi_left CategoryTheory.Limits.coprod.epi_desc_of_epi_left instance coprod.epi_desc_of_epi_right {W X Y : C} [HasBinaryCoproduct X Y] (f : X ⟶ W) (g : Y ⟶ W) [Epi g] : Epi (coprod.desc f g) := epi_of_epi_fac <\| coprod.inr_desc _ _ #align category_theory.limits.coprod.epi_desc_of_epi_right CategoryTheory.Limits.coprod.epi_desc_of_epi_right def prod.lift' {W X Y : C} [HasBinaryProduct X Y] (f : W ⟶ X) (g : W ⟶ Y) : { l : W ⟶ X ⨯ Y // l ≫ prod.fst = f ∧ l ≫ prod.snd = g } := ⟨prod.lift f g, prod.lift_fst _ _, prod.lift_snd _ _⟩ #align category_theory.limits.prod.lift' CategoryTheory.Limits.prod.lift' def coprod.desc' {W X Y : C} [HasBinaryCoproduct X Y] (f : X ⟶ W) (g : Y ⟶ W) : { l : X ⨿ Y ⟶ W // coprod.inl ≫ l = f ∧ coprod.inr ≫ l = g } := ⟨coprod.desc f g, coprod.inl_desc _ _, coprod.inr_desc _ _⟩ #align category_theory.limits.coprod.desc' CategoryTheory.Limits.coprod.desc' def prod.map {W X Y Z : C} [HasBinaryProduct W X] [HasBinaryProduct Y Z] (f : W ⟶ Y) (g : X ⟶ Z) : W ⨯ X ⟶ Y ⨯ Z := limMap (mapPair f g) #align category_theory.limits.prod.map CategoryTheory.Limits.prod.map def coprod.map {W X Y Z : C} [HasBinaryCoproduct W X] [HasBinaryCoproduct Y Z] (f : W ⟶ Y) (g : X ⟶ Z) : W ⨿ X ⟶ Y ⨿ Z := colimMap (mapPair f g) #align category_theory.limits.coprod.map CategoryTheory.Limits.coprod.map variable (C) abbrev HasBinaryProducts := HasLimitsOfShape (Discrete WalkingPair) C #align category_theory.limits.has_binary_products CategoryTheory.Limits.HasBinaryProducts abbrev HasBinaryCoproducts := HasColimitsOfShape (Discrete WalkingPair) C #align category_theory.limits.has_binary_coproducts CategoryTheory.Limits.HasBinaryCoproducts theorem hasBinaryProducts_of_hasLimit_pair [∀ {X Y : C}, HasLimit (pair X Y)] : HasBinaryProducts C := { has_limit := fun F => hasLimitOfIso (diagramIsoPair F).symm } #align category_theory.limits.has_binary_products_of_has_limit_pair CategoryTheory.Limits.hasBinaryProducts_of_hasLimit_pair theorem hasBinaryCoproducts_of_hasColimit_pair [∀ {X Y : C}, HasColimit (pair X Y)] : HasBinaryCoproducts C := { has_colimit := fun F => hasColimitOfIso (diagramIsoPair F) } #align category_theory.limits.has_binary_coproducts_of_has_colimit_pair CategoryTheory.Limits.hasBinaryCoproducts_of_hasColimit_pair section variable {C} @[simps] def prod.braiding (P Q : C) [HasBinaryProduct P Q] [HasBinaryProduct Q P] : P ⨯ Q ≅ Q ⨯ P where hom := prod.lift prod.snd prod.fst inv := prod.lift prod.snd prod.fst #align category_theory.limits.prod.braiding CategoryTheory.Limits.prod.braiding @[reassoc] theorem braid_natural [HasBinaryProducts C] {W X Y Z : C} (f : X ⟶ Y) (g : Z ⟶ W) : prod.map f g ≫ (prod.braiding _ _).hom = (prod.braiding _ _).hom ≫ prod.map g f := by simp #align category_theory.limits.braid_natural CategoryTheory.Limits.braid_natural #align category_theory.limits.braid_natural_assoc CategoryTheory.Limits.braid_natural_assoc @[reassoc] theorem prod.symmetry' (P Q : C) [HasBinaryProduct P Q] [HasBinaryProduct Q P] : prod.lift prod.snd prod.fst ≫ prod.lift prod.snd prod.fst = 𝟙 (P ⨯ Q) := (prod.braiding _ _).hom_inv_id #align category_theory.limits.prod.symmetry' CategoryTheory.Limits.prod.symmetry' #align category_theory.limits.prod.symmetry'_assoc CategoryTheory.Limits.prod.symmetry'_assoc @[reassoc] theorem prod.symmetry (P Q : C) [HasBinaryProduct P Q] [HasBinaryProduct Q P] : (prod.braiding P Q).hom ≫ (prod.braiding Q P).hom = 𝟙 _ := (prod.braiding _ _).hom_inv_id #align category_theory.limits.prod.symmetry CategoryTheory.Limits.prod.symmetry #align category_theory.limits.prod.symmetry_assoc CategoryTheory.Limits.prod.symmetry_assoc @[simps] def prod.associator [HasBinaryProducts C] (P Q R : C) : (P ⨯ Q) ⨯ R ≅ P ⨯ Q ⨯ R where hom := prod.lift (prod.fst ≫ prod.fst) (prod.lift (prod.fst ≫ prod.snd) prod.snd) inv := prod.lift (prod.lift prod.fst (prod.snd ≫ prod.fst)) (prod.snd ≫ prod.snd) #align category_theory.limits.prod.associator CategoryTheory.Limits.prod.associator @[reassoc] theorem prod.pentagon [HasBinaryProducts C] (W X Y Z : C) : prod.map (prod.associator W X Y).hom (𝟙 Z) ≫ (prod.associator W (X ⨯ Y) Z).hom ≫ prod.map (𝟙 W) (prod.associator X Y Z).hom = (prod.associator (W ⨯ X) Y Z).hom ≫ (prod.associator W X (Y ⨯ Z)).hom := by simp #align category_theory.limits.prod.pentagon CategoryTheory.Limits.prod.pentagon #align category_theory.limits.prod.pentagon_assoc CategoryTheory.Limits.prod.pentagon_assoc @[reassoc] theorem prod.associator_naturality [HasBinaryProducts C] {X₁ X₂ X₃ Y₁ Y₂ Y₃ : C} (f₁ : X₁ ⟶ Y₁) (f₂ : X₂ ⟶ Y₂) (f₃ : X₃ ⟶ Y₃) : prod.map (prod.map f₁ f₂) f₃ ≫ (prod.associator Y₁ Y₂ Y₃).hom = (prod.associator X₁ X₂ X₃).hom ≫ prod.map f₁ (prod.map f₂ f₃) := by simp #align category_theory.limits.prod.associator_naturality CategoryTheory.Limits.prod.associator_naturality #align category_theory.limits.prod.associator_naturality_assoc CategoryTheory.Limits.prod.associator_naturality_assoc variable [HasTerminal C] @[simps] def prod.leftUnitor (P : C) [HasBinaryProduct (⊤_ C) P] : (⊤_ C) ⨯ P ≅ P where hom := prod.snd inv := prod.lift (terminal.from P) (𝟙 _) hom_inv_id := by apply prod.hom_ext <;> simp [eq_iff_true_of_subsingleton] inv_hom_id := by simp #align category_theory.limits.prod.left_unitor CategoryTheory.Limits.prod.leftUnitor @[simps] def prod.rightUnitor (P : C) [HasBinaryProduct P (⊤_ C)] : P ⨯ ⊤_ C ≅ P where hom := prod.fst inv := prod.lift (𝟙 _) (terminal.from P) hom_inv_id := by apply prod.hom_ext <;> simp [eq_iff_true_of_subsingleton] inv_hom_id := by simp #align category_theory.limits.prod.right_unitor CategoryTheory.Limits.prod.rightUnitor @[reassoc] theorem prod.leftUnitor_hom_naturality [HasBinaryProducts C] (f : X ⟶ Y) : prod.map (𝟙 _) f ≫ (prod.leftUnitor Y).hom = (prod.leftUnitor X).hom ≫ f := prod.map_snd _ _ #align category_theory.limits.prod.left_unitor_hom_naturality CategoryTheory.Limits.prod.leftUnitor_hom_naturality #align category_theory.limits.prod.left_unitor_hom_naturality_assoc CategoryTheory.Limits.prod.leftUnitor_hom_naturality_assoc @[reassoc] theorem prod.leftUnitor_inv_naturality [HasBinaryProducts C] (f : X ⟶ Y) : (prod.leftUnitor X).inv ≫ prod.map (𝟙 _) f = f ≫ (prod.leftUnitor Y).inv := by rw [Iso.inv_comp_eq, ← Category.assoc, Iso.eq_comp_inv, prod.leftUnitor_hom_naturality] #align category_theory.limits.prod.left_unitor_inv_naturality CategoryTheory.Limits.prod.leftUnitor_inv_naturality #align category_theory.limits.prod.left_unitor_inv_naturality_assoc CategoryTheory.Limits.prod.leftUnitor_inv_naturality_assoc @[reassoc] theorem prod.rightUnitor_hom_naturality [HasBinaryProducts C] (f : X ⟶ Y) : prod.map f (𝟙 _) ≫ (prod.rightUnitor Y).hom = (prod.rightUnitor X).hom ≫ f := prod.map_fst _ _ #align category_theory.limits.prod.right_unitor_hom_naturality CategoryTheory.Limits.prod.rightUnitor_hom_naturality #align category_theory.limits.prod.right_unitor_hom_naturality_assoc CategoryTheory.Limits.prod.rightUnitor_hom_naturality_assoc @[reassoc] theorem prod_rightUnitor_inv_naturality [HasBinaryProducts C] (f : X ⟶ Y) : (prod.rightUnitor X).inv ≫ prod.map f (𝟙 _) = f ≫ (prod.rightUnitor Y).inv := by rw [Iso.inv_comp_eq, ← Category.assoc, Iso.eq_comp_inv, prod.rightUnitor_hom_naturality] #align category_theory.limits.prod_right_unitor_inv_naturality CategoryTheory.Limits.prod_rightUnitor_inv_naturality #align category_theory.limits.prod_right_unitor_inv_naturality_assoc CategoryTheory.Limits.prod_rightUnitor_inv_naturality_assoc	Mathlib/CategoryTheory/Limits/Shapes/BinaryProducts.lean	1,113	1,116	theorem prod.triangle [HasBinaryProducts C] (X Y : C) : (prod.associator X (⊤_ C) Y).hom ≫ prod.map (𝟙 X) (prod.leftUnitor Y).hom = prod.map (prod.rightUnitor X).hom (𝟙 Y) := by	ext <;> simp
import Mathlib.Analysis.SpecialFunctions.Pow.Real #align_import analysis.special_functions.pow.nnreal from "leanprover-community/mathlib"@"4fa54b337f7d52805480306db1b1439c741848c8" noncomputable section open scoped Classical open Real NNReal ENNReal ComplexConjugate open Finset Function Set namespace NNReal variable {w x y z : ℝ} noncomputable def rpow (x : ℝ≥0) (y : ℝ) : ℝ≥0 := ⟨(x : ℝ) ^ y, Real.rpow_nonneg x.2 y⟩ #align nnreal.rpow NNReal.rpow noncomputable instance : Pow ℝ≥0 ℝ := ⟨rpow⟩ @[simp] theorem rpow_eq_pow (x : ℝ≥0) (y : ℝ) : rpow x y = x ^ y := rfl #align nnreal.rpow_eq_pow NNReal.rpow_eq_pow @[simp, norm_cast] theorem coe_rpow (x : ℝ≥0) (y : ℝ) : ((x ^ y : ℝ≥0) : ℝ) = (x : ℝ) ^ y := rfl #align nnreal.coe_rpow NNReal.coe_rpow @[simp] theorem rpow_zero (x : ℝ≥0) : x ^ (0 : ℝ) = 1 := NNReal.eq <\| Real.rpow_zero _ #align nnreal.rpow_zero NNReal.rpow_zero @[simp] theorem rpow_eq_zero_iff {x : ℝ≥0} {y : ℝ} : x ^ y = 0 ↔ x = 0 ∧ y ≠ 0 := by rw [← NNReal.coe_inj, coe_rpow, ← NNReal.coe_eq_zero] exact Real.rpow_eq_zero_iff_of_nonneg x.2 #align nnreal.rpow_eq_zero_iff NNReal.rpow_eq_zero_iff @[simp] theorem zero_rpow {x : ℝ} (h : x ≠ 0) : (0 : ℝ≥0) ^ x = 0 := NNReal.eq <\| Real.zero_rpow h #align nnreal.zero_rpow NNReal.zero_rpow @[simp] theorem rpow_one (x : ℝ≥0) : x ^ (1 : ℝ) = x := NNReal.eq <\| Real.rpow_one _ #align nnreal.rpow_one NNReal.rpow_one @[simp] theorem one_rpow (x : ℝ) : (1 : ℝ≥0) ^ x = 1 := NNReal.eq <\| Real.one_rpow _ #align nnreal.one_rpow NNReal.one_rpow theorem rpow_add {x : ℝ≥0} (hx : x ≠ 0) (y z : ℝ) : x ^ (y + z) = x ^ y * x ^ z := NNReal.eq <\| Real.rpow_add (pos_iff_ne_zero.2 hx) _ _ #align nnreal.rpow_add NNReal.rpow_add theorem rpow_add' (x : ℝ≥0) {y z : ℝ} (h : y + z ≠ 0) : x ^ (y + z) = x ^ y * x ^ z := NNReal.eq <\| Real.rpow_add' x.2 h #align nnreal.rpow_add' NNReal.rpow_add' lemma rpow_of_add_eq (x : ℝ≥0) (hw : w ≠ 0) (h : y + z = w) : x ^ w = x ^ y * x ^ z := by rw [← h, rpow_add']; rwa [h] theorem rpow_mul (x : ℝ≥0) (y z : ℝ) : x ^ (y * z) = (x ^ y) ^ z := NNReal.eq <\| Real.rpow_mul x.2 y z #align nnreal.rpow_mul NNReal.rpow_mul theorem rpow_neg (x : ℝ≥0) (y : ℝ) : x ^ (-y) = (x ^ y)⁻¹ := NNReal.eq <\| Real.rpow_neg x.2 _ #align nnreal.rpow_neg NNReal.rpow_neg theorem rpow_neg_one (x : ℝ≥0) : x ^ (-1 : ℝ) = x⁻¹ := by simp [rpow_neg] #align nnreal.rpow_neg_one NNReal.rpow_neg_one theorem rpow_sub {x : ℝ≥0} (hx : x ≠ 0) (y z : ℝ) : x ^ (y - z) = x ^ y / x ^ z := NNReal.eq <\| Real.rpow_sub (pos_iff_ne_zero.2 hx) y z #align nnreal.rpow_sub NNReal.rpow_sub theorem rpow_sub' (x : ℝ≥0) {y z : ℝ} (h : y - z ≠ 0) : x ^ (y - z) = x ^ y / x ^ z := NNReal.eq <\| Real.rpow_sub' x.2 h #align nnreal.rpow_sub' NNReal.rpow_sub' theorem rpow_inv_rpow_self {y : ℝ} (hy : y ≠ 0) (x : ℝ≥0) : (x ^ y) ^ (1 / y) = x := by field_simp [← rpow_mul] #align nnreal.rpow_inv_rpow_self NNReal.rpow_inv_rpow_self theorem rpow_self_rpow_inv {y : ℝ} (hy : y ≠ 0) (x : ℝ≥0) : (x ^ (1 / y)) ^ y = x := by field_simp [← rpow_mul] #align nnreal.rpow_self_rpow_inv NNReal.rpow_self_rpow_inv theorem inv_rpow (x : ℝ≥0) (y : ℝ) : x⁻¹ ^ y = (x ^ y)⁻¹ := NNReal.eq <\| Real.inv_rpow x.2 y #align nnreal.inv_rpow NNReal.inv_rpow theorem div_rpow (x y : ℝ≥0) (z : ℝ) : (x / y) ^ z = x ^ z / y ^ z := NNReal.eq <\| Real.div_rpow x.2 y.2 z #align nnreal.div_rpow NNReal.div_rpow theorem sqrt_eq_rpow (x : ℝ≥0) : sqrt x = x ^ (1 / (2 : ℝ)) := by refine NNReal.eq ?_ push_cast exact Real.sqrt_eq_rpow x.1 #align nnreal.sqrt_eq_rpow NNReal.sqrt_eq_rpow @[simp, norm_cast] theorem rpow_natCast (x : ℝ≥0) (n : ℕ) : x ^ (n : ℝ) = x ^ n := NNReal.eq <\| by simpa only [coe_rpow, coe_pow] using Real.rpow_natCast x n #align nnreal.rpow_nat_cast NNReal.rpow_natCast @[deprecated (since := "2024-04-17")] alias rpow_nat_cast := rpow_natCast @[simp] lemma rpow_ofNat (x : ℝ≥0) (n : ℕ) [n.AtLeastTwo] : x ^ (no_index (OfNat.ofNat n) : ℝ) = x ^ (OfNat.ofNat n : ℕ) := rpow_natCast x n theorem rpow_two (x : ℝ≥0) : x ^ (2 : ℝ) = x ^ 2 := rpow_ofNat x 2 #align nnreal.rpow_two NNReal.rpow_two theorem mul_rpow {x y : ℝ≥0} {z : ℝ} : (x * y) ^ z = x ^ z * y ^ z := NNReal.eq <\| Real.mul_rpow x.2 y.2 #align nnreal.mul_rpow NNReal.mul_rpow @[simps] def rpowMonoidHom (r : ℝ) : ℝ≥0 →* ℝ≥0 where toFun := (· ^ r) map_one' := one_rpow _ map_mul' _x _y := mul_rpow theorem list_prod_map_rpow (l : List ℝ≥0) (r : ℝ) : (l.map (· ^ r)).prod = l.prod ^ r := l.prod_hom (rpowMonoidHom r) theorem list_prod_map_rpow' {ι} (l : List ι) (f : ι → ℝ≥0) (r : ℝ) : (l.map (f · ^ r)).prod = (l.map f).prod ^ r := by rw [← list_prod_map_rpow, List.map_map]; rfl lemma multiset_prod_map_rpow {ι} (s : Multiset ι) (f : ι → ℝ≥0) (r : ℝ) : (s.map (f · ^ r)).prod = (s.map f).prod ^ r := s.prod_hom' (rpowMonoidHom r) _ lemma finset_prod_rpow {ι} (s : Finset ι) (f : ι → ℝ≥0) (r : ℝ) : (∏ i ∈ s, f i ^ r) = (∏ i ∈ s, f i) ^ r := multiset_prod_map_rpow _ _ _ -- note: these don't really belong here, but they're much easier to prove in terms of the above namespace ENNReal noncomputable def rpow : ℝ≥0∞ → ℝ → ℝ≥0∞ \| some x, y => if x = 0 ∧ y < 0 then ⊤ else (x ^ y : ℝ≥0) \| none, y => if 0 < y then ⊤ else if y = 0 then 1 else 0 #align ennreal.rpow ENNReal.rpow noncomputable instance : Pow ℝ≥0∞ ℝ := ⟨rpow⟩ @[simp] theorem rpow_eq_pow (x : ℝ≥0∞) (y : ℝ) : rpow x y = x ^ y := rfl #align ennreal.rpow_eq_pow ENNReal.rpow_eq_pow @[simp] theorem rpow_zero {x : ℝ≥0∞} : x ^ (0 : ℝ) = 1 := by cases x <;> · dsimp only [(· ^ ·), Pow.pow, rpow] simp [lt_irrefl] #align ennreal.rpow_zero ENNReal.rpow_zero theorem top_rpow_def (y : ℝ) : (⊤ : ℝ≥0∞) ^ y = if 0 < y then ⊤ else if y = 0 then 1 else 0 := rfl #align ennreal.top_rpow_def ENNReal.top_rpow_def @[simp] theorem top_rpow_of_pos {y : ℝ} (h : 0 < y) : (⊤ : ℝ≥0∞) ^ y = ⊤ := by simp [top_rpow_def, h] #align ennreal.top_rpow_of_pos ENNReal.top_rpow_of_pos @[simp] theorem top_rpow_of_neg {y : ℝ} (h : y < 0) : (⊤ : ℝ≥0∞) ^ y = 0 := by simp [top_rpow_def, asymm h, ne_of_lt h] #align ennreal.top_rpow_of_neg ENNReal.top_rpow_of_neg @[simp] theorem zero_rpow_of_pos {y : ℝ} (h : 0 < y) : (0 : ℝ≥0∞) ^ y = 0 := by rw [← ENNReal.coe_zero, ← ENNReal.some_eq_coe] dsimp only [(· ^ ·), rpow, Pow.pow] simp [h, asymm h, ne_of_gt h] #align ennreal.zero_rpow_of_pos ENNReal.zero_rpow_of_pos @[simp] theorem zero_rpow_of_neg {y : ℝ} (h : y < 0) : (0 : ℝ≥0∞) ^ y = ⊤ := by rw [← ENNReal.coe_zero, ← ENNReal.some_eq_coe] dsimp only [(· ^ ·), rpow, Pow.pow] simp [h, ne_of_gt h] #align ennreal.zero_rpow_of_neg ENNReal.zero_rpow_of_neg theorem zero_rpow_def (y : ℝ) : (0 : ℝ≥0∞) ^ y = if 0 < y then 0 else if y = 0 then 1 else ⊤ := by rcases lt_trichotomy (0 : ℝ) y with (H \| rfl \| H) · simp [H, ne_of_gt, zero_rpow_of_pos, lt_irrefl] · simp [lt_irrefl] · simp [H, asymm H, ne_of_lt, zero_rpow_of_neg] #align ennreal.zero_rpow_def ENNReal.zero_rpow_def @[simp] theorem zero_rpow_mul_self (y : ℝ) : (0 : ℝ≥0∞) ^ y * (0 : ℝ≥0∞) ^ y = (0 : ℝ≥0∞) ^ y := by rw [zero_rpow_def] split_ifs exacts [zero_mul _, one_mul _, top_mul_top] #align ennreal.zero_rpow_mul_self ENNReal.zero_rpow_mul_self @[norm_cast] theorem coe_rpow_of_ne_zero {x : ℝ≥0} (h : x ≠ 0) (y : ℝ) : (x : ℝ≥0∞) ^ y = (x ^ y : ℝ≥0) := by rw [← ENNReal.some_eq_coe] dsimp only [(· ^ ·), Pow.pow, rpow] simp [h] #align ennreal.coe_rpow_of_ne_zero ENNReal.coe_rpow_of_ne_zero @[norm_cast]	Mathlib/Analysis/SpecialFunctions/Pow/NNReal.lean	452	457	theorem coe_rpow_of_nonneg (x : ℝ≥0) {y : ℝ} (h : 0 ≤ y) : (x : ℝ≥0∞) ^ y = (x ^ y : ℝ≥0) := by	by_cases hx : x = 0 · rcases le_iff_eq_or_lt.1 h with (H \| H) · simp [hx, H.symm] · simp [hx, zero_rpow_of_pos H, NNReal.zero_rpow (ne_of_gt H)] · exact coe_rpow_of_ne_zero hx _
import Mathlib.Algebra.Group.Prod import Mathlib.Data.Set.Lattice #align_import data.nat.pairing from "leanprover-community/mathlib"@"207cfac9fcd06138865b5d04f7091e46d9320432" assert_not_exists MonoidWithZero open Prod Decidable Function namespace Nat -- Porting note: no pp_nodot --@[pp_nodot] def pair (a b : ℕ) : ℕ := if a < b then b * b + a else a * a + a + b #align nat.mkpair Nat.pair -- Porting note: no pp_nodot --@[pp_nodot] def unpair (n : ℕ) : ℕ × ℕ := let s := sqrt n if n - s * s < s then (n - s * s, s) else (s, n - s * s - s) #align nat.unpair Nat.unpair @[simp] theorem pair_unpair (n : ℕ) : pair (unpair n).1 (unpair n).2 = n := by dsimp only [unpair]; let s := sqrt n have sm : s * s + (n - s * s) = n := Nat.add_sub_cancel' (sqrt_le _) split_ifs with h · simp [pair, h, sm] · have hl : n - s * s - s ≤ s := Nat.sub_le_iff_le_add.2 (Nat.sub_le_iff_le_add'.2 <\| by rw [← Nat.add_assoc]; apply sqrt_le_add) simp [pair, hl.not_lt, Nat.add_assoc, Nat.add_sub_cancel' (le_of_not_gt h), sm] #align nat.mkpair_unpair Nat.pair_unpair theorem pair_unpair' {n a b} (H : unpair n = (a, b)) : pair a b = n := by simpa [H] using pair_unpair n #align nat.mkpair_unpair' Nat.pair_unpair' @[simp]	Mathlib/Data/Nat/Pairing.lean	64	73	theorem unpair_pair (a b : ℕ) : unpair (pair a b) = (a, b) := by	dsimp only [pair]; split_ifs with h · show unpair (b * b + a) = (a, b) have be : sqrt (b * b + a) = b := sqrt_add_eq _ (le_trans (le_of_lt h) (Nat.le_add_left _ _)) simp [unpair, be, Nat.add_sub_cancel_left, h] · show unpair (a * a + a + b) = (a, b) have ae : sqrt (a * a + (a + b)) = a := by rw [sqrt_add_eq] exact Nat.add_le_add_left (le_of_not_gt h) _ simp [unpair, ae, Nat.not_lt_zero, Nat.add_assoc, Nat.add_sub_cancel_left]
import Mathlib.Algebra.Order.Ring.Defs import Mathlib.Algebra.Group.Int import Mathlib.Data.Nat.Dist import Mathlib.Data.Ordmap.Ordnode import Mathlib.Tactic.Abel import Mathlib.Tactic.Linarith #align_import data.ordmap.ordset from "leanprover-community/mathlib"@"47b51515e69f59bca5cf34ef456e6000fe205a69" variable {α : Type} namespace Ordnode theorem not_le_delta {s} (H : 1 ≤ s) : ¬s ≤ delta 0 := not_le_of_gt H #align ordnode.not_le_delta Ordnode.not_le_delta theorem delta_lt_false {a b : ℕ} (h₁ : delta * a < b) (h₂ : delta * b < a) : False := not_le_of_lt (lt_trans ((mul_lt_mul_left (by decide)).2 h₁) h₂) <\| by simpa [mul_assoc] using Nat.mul_le_mul_right a (by decide : 1 ≤ delta * delta) #align ordnode.delta_lt_false Ordnode.delta_lt_false def realSize : Ordnode α → ℕ \| nil => 0 \| node _ l _ r => realSize l + realSize r + 1 #align ordnode.real_size Ordnode.realSize def Sized : Ordnode α → Prop \| nil => True \| node s l _ r => s = size l + size r + 1 ∧ Sized l ∧ Sized r #align ordnode.sized Ordnode.Sized theorem Sized.node' {l x r} (hl : @Sized α l) (hr : Sized r) : Sized (node' l x r) := ⟨rfl, hl, hr⟩ #align ordnode.sized.node' Ordnode.Sized.node' theorem Sized.eq_node' {s l x r} (h : @Sized α (node s l x r)) : node s l x r = .node' l x r := by rw [h.1] #align ordnode.sized.eq_node' Ordnode.Sized.eq_node' theorem Sized.size_eq {s l x r} (H : Sized (@node α s l x r)) : size (@node α s l x r) = size l + size r + 1 := H.1 #align ordnode.sized.size_eq Ordnode.Sized.size_eq @[elab_as_elim] theorem Sized.induction {t} (hl : @Sized α t) {C : Ordnode α → Prop} (H0 : C nil) (H1 : ∀ l x r, C l → C r → C (.node' l x r)) : C t := by induction t with \| nil => exact H0 \| node _ _ _ _ t_ih_l t_ih_r => rw [hl.eq_node'] exact H1 _ _ _ (t_ih_l hl.2.1) (t_ih_r hl.2.2) #align ordnode.sized.induction Ordnode.Sized.induction theorem size_eq_realSize : ∀ {t : Ordnode α}, Sized t → size t = realSize t \| nil, _ => rfl \| node s l x r, ⟨h₁, h₂, h₃⟩ => by rw [size, h₁, size_eq_realSize h₂, size_eq_realSize h₃]; rfl #align ordnode.size_eq_real_size Ordnode.size_eq_realSize @[simp] theorem Sized.size_eq_zero {t : Ordnode α} (ht : Sized t) : size t = 0 ↔ t = nil := by cases t <;> [simp;simp [ht.1]] #align ordnode.sized.size_eq_zero Ordnode.Sized.size_eq_zero theorem Sized.pos {s l x r} (h : Sized (@node α s l x r)) : 0 < s := by rw [h.1]; apply Nat.le_add_left #align ordnode.sized.pos Ordnode.Sized.pos theorem dual_dual : ∀ t : Ordnode α, dual (dual t) = t \| nil => rfl \| node s l x r => by rw [dual, dual, dual_dual l, dual_dual r] #align ordnode.dual_dual Ordnode.dual_dual @[simp] theorem size_dual (t : Ordnode α) : size (dual t) = size t := by cases t <;> rfl #align ordnode.size_dual Ordnode.size_dual def BalancedSz (l r : ℕ) : Prop := l + r ≤ 1 ∨ l ≤ delta * r ∧ r ≤ delta * l #align ordnode.balanced_sz Ordnode.BalancedSz instance BalancedSz.dec : DecidableRel BalancedSz := fun _ _ => Or.decidable #align ordnode.balanced_sz.dec Ordnode.BalancedSz.dec def Balanced : Ordnode α → Prop \| nil => True \| node _ l _ r => BalancedSz (size l) (size r) ∧ Balanced l ∧ Balanced r #align ordnode.balanced Ordnode.Balanced instance Balanced.dec : DecidablePred (@Balanced α) \| nil => by unfold Balanced infer_instance \| node _ l _ r => by unfold Balanced haveI := Balanced.dec l haveI := Balanced.dec r infer_instance #align ordnode.balanced.dec Ordnode.Balanced.dec @[symm] theorem BalancedSz.symm {l r : ℕ} : BalancedSz l r → BalancedSz r l := Or.imp (by rw [add_comm]; exact id) And.symm #align ordnode.balanced_sz.symm Ordnode.BalancedSz.symm theorem balancedSz_zero {l : ℕ} : BalancedSz l 0 ↔ l ≤ 1 := by simp (config := { contextual := true }) [BalancedSz] #align ordnode.balanced_sz_zero Ordnode.balancedSz_zero theorem balancedSz_up {l r₁ r₂ : ℕ} (h₁ : r₁ ≤ r₂) (h₂ : l + r₂ ≤ 1 ∨ r₂ ≤ delta * l) (H : BalancedSz l r₁) : BalancedSz l r₂ := by refine or_iff_not_imp_left.2 fun h => ?_ refine ⟨?_, h₂.resolve_left h⟩ cases H with \| inl H => cases r₂ · cases h (le_trans (Nat.add_le_add_left (Nat.zero_le _) _) H) · exact le_trans (le_trans (Nat.le_add_right _ _) H) (Nat.le_add_left 1 _) \| inr H => exact le_trans H.1 (Nat.mul_le_mul_left _ h₁) #align ordnode.balanced_sz_up Ordnode.balancedSz_up theorem balancedSz_down {l r₁ r₂ : ℕ} (h₁ : r₁ ≤ r₂) (h₂ : l + r₂ ≤ 1 ∨ l ≤ delta * r₁) (H : BalancedSz l r₂) : BalancedSz l r₁ := have : l + r₂ ≤ 1 → BalancedSz l r₁ := fun H => Or.inl (le_trans (Nat.add_le_add_left h₁ _) H) Or.casesOn H this fun H => Or.casesOn h₂ this fun h₂ => Or.inr ⟨h₂, le_trans h₁ H.2⟩ #align ordnode.balanced_sz_down Ordnode.balancedSz_down theorem Balanced.dual : ∀ {t : Ordnode α}, Balanced t → Balanced (dual t) \| nil, _ => ⟨⟩ \| node _ l _ r, ⟨b, bl, br⟩ => ⟨by rw [size_dual, size_dual]; exact b.symm, br.dual, bl.dual⟩ #align ordnode.balanced.dual Ordnode.Balanced.dual def node3L (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : Ordnode α := node' (node' l x m) y r #align ordnode.node3_l Ordnode.node3L def node3R (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : Ordnode α := node' l x (node' m y r) #align ordnode.node3_r Ordnode.node3R def node4L : Ordnode α → α → Ordnode α → α → Ordnode α → Ordnode α \| l, x, node _ ml y mr, z, r => node' (node' l x ml) y (node' mr z r) \| l, x, nil, z, r => node3L l x nil z r #align ordnode.node4_l Ordnode.node4L -- should not happen def node4R : Ordnode α → α → Ordnode α → α → Ordnode α → Ordnode α \| l, x, node _ ml y mr, z, r => node' (node' l x ml) y (node' mr z r) \| l, x, nil, z, r => node3R l x nil z r #align ordnode.node4_r Ordnode.node4R -- should not happen def rotateL : Ordnode α → α → Ordnode α → Ordnode α \| l, x, node _ m y r => if size m < ratio * size r then node3L l x m y r else node4L l x m y r \| l, x, nil => node' l x nil #align ordnode.rotate_l Ordnode.rotateL -- Porting note (#11467): during the port we marked these lemmas with `@[eqns]` -- to emulate the old Lean 3 behaviour. theorem rotateL_node (l : Ordnode α) (x : α) (sz : ℕ) (m : Ordnode α) (y : α) (r : Ordnode α) : rotateL l x (node sz m y r) = if size m < ratio * size r then node3L l x m y r else node4L l x m y r := rfl theorem rotateL_nil (l : Ordnode α) (x : α) : rotateL l x nil = node' l x nil := rfl -- should not happen def rotateR : Ordnode α → α → Ordnode α → Ordnode α \| node _ l x m, y, r => if size m < ratio * size l then node3R l x m y r else node4R l x m y r \| nil, y, r => node' nil y r #align ordnode.rotate_r Ordnode.rotateR -- Porting note (#11467): during the port we marked these lemmas with `@[eqns]` -- to emulate the old Lean 3 behaviour. theorem rotateR_node (sz : ℕ) (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : rotateR (node sz l x m) y r = if size m < ratio * size l then node3R l x m y r else node4R l x m y r := rfl theorem rotateR_nil (y : α) (r : Ordnode α) : rotateR nil y r = node' nil y r := rfl -- should not happen def balanceL' (l : Ordnode α) (x : α) (r : Ordnode α) : Ordnode α := if size l + size r ≤ 1 then node' l x r else if size l > delta * size r then rotateR l x r else node' l x r #align ordnode.balance_l' Ordnode.balanceL' def balanceR' (l : Ordnode α) (x : α) (r : Ordnode α) : Ordnode α := if size l + size r ≤ 1 then node' l x r else if size r > delta * size l then rotateL l x r else node' l x r #align ordnode.balance_r' Ordnode.balanceR' def balance' (l : Ordnode α) (x : α) (r : Ordnode α) : Ordnode α := if size l + size r ≤ 1 then node' l x r else if size r > delta * size l then rotateL l x r else if size l > delta * size r then rotateR l x r else node' l x r #align ordnode.balance' Ordnode.balance' theorem dual_node' (l : Ordnode α) (x : α) (r : Ordnode α) : dual (node' l x r) = node' (dual r) x (dual l) := by simp [node', add_comm] #align ordnode.dual_node' Ordnode.dual_node' theorem dual_node3L (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : dual (node3L l x m y r) = node3R (dual r) y (dual m) x (dual l) := by simp [node3L, node3R, dual_node', add_comm] #align ordnode.dual_node3_l Ordnode.dual_node3L theorem dual_node3R (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : dual (node3R l x m y r) = node3L (dual r) y (dual m) x (dual l) := by simp [node3L, node3R, dual_node', add_comm] #align ordnode.dual_node3_r Ordnode.dual_node3R theorem dual_node4L (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : dual (node4L l x m y r) = node4R (dual r) y (dual m) x (dual l) := by cases m <;> simp [node4L, node4R, node3R, dual_node3L, dual_node', add_comm] #align ordnode.dual_node4_l Ordnode.dual_node4L theorem dual_node4R (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : dual (node4R l x m y r) = node4L (dual r) y (dual m) x (dual l) := by cases m <;> simp [node4L, node4R, node3L, dual_node3R, dual_node', add_comm] #align ordnode.dual_node4_r Ordnode.dual_node4R theorem dual_rotateL (l : Ordnode α) (x : α) (r : Ordnode α) : dual (rotateL l x r) = rotateR (dual r) x (dual l) := by cases r <;> simp [rotateL, rotateR, dual_node']; split_ifs <;> simp [dual_node3L, dual_node4L, node3R, add_comm] #align ordnode.dual_rotate_l Ordnode.dual_rotateL theorem dual_rotateR (l : Ordnode α) (x : α) (r : Ordnode α) : dual (rotateR l x r) = rotateL (dual r) x (dual l) := by rw [← dual_dual (rotateL _ _ _), dual_rotateL, dual_dual, dual_dual] #align ordnode.dual_rotate_r Ordnode.dual_rotateR theorem dual_balance' (l : Ordnode α) (x : α) (r : Ordnode α) : dual (balance' l x r) = balance' (dual r) x (dual l) := by simp [balance', add_comm]; split_ifs with h h_1 h_2 <;> simp [dual_node', dual_rotateL, dual_rotateR, add_comm] cases delta_lt_false h_1 h_2 #align ordnode.dual_balance' Ordnode.dual_balance' theorem dual_balanceL (l : Ordnode α) (x : α) (r : Ordnode α) : dual (balanceL l x r) = balanceR (dual r) x (dual l) := by unfold balanceL balanceR cases' r with rs rl rx rr · cases' l with ls ll lx lr; · rfl cases' ll with lls lll llx llr <;> cases' lr with lrs lrl lrx lrr <;> dsimp only [dual, id] <;> try rfl split_ifs with h <;> repeat simp [h, add_comm] · cases' l with ls ll lx lr; · rfl dsimp only [dual, id] split_ifs; swap; · simp [add_comm] cases' ll with lls lll llx llr <;> cases' lr with lrs lrl lrx lrr <;> try rfl dsimp only [dual, id] split_ifs with h <;> simp [h, add_comm] #align ordnode.dual_balance_l Ordnode.dual_balanceL theorem dual_balanceR (l : Ordnode α) (x : α) (r : Ordnode α) : dual (balanceR l x r) = balanceL (dual r) x (dual l) := by rw [← dual_dual (balanceL _ _ _), dual_balanceL, dual_dual, dual_dual] #align ordnode.dual_balance_r Ordnode.dual_balanceR theorem Sized.node3L {l x m y r} (hl : @Sized α l) (hm : Sized m) (hr : Sized r) : Sized (node3L l x m y r) := (hl.node' hm).node' hr #align ordnode.sized.node3_l Ordnode.Sized.node3L theorem Sized.node3R {l x m y r} (hl : @Sized α l) (hm : Sized m) (hr : Sized r) : Sized (node3R l x m y r) := hl.node' (hm.node' hr) #align ordnode.sized.node3_r Ordnode.Sized.node3R theorem Sized.node4L {l x m y r} (hl : @Sized α l) (hm : Sized m) (hr : Sized r) : Sized (node4L l x m y r) := by cases m <;> [exact (hl.node' hm).node' hr; exact (hl.node' hm.2.1).node' (hm.2.2.node' hr)] #align ordnode.sized.node4_l Ordnode.Sized.node4L theorem node3L_size {l x m y r} : size (@node3L α l x m y r) = size l + size m + size r + 2 := by dsimp [node3L, node', size]; rw [add_right_comm _ 1] #align ordnode.node3_l_size Ordnode.node3L_size theorem node3R_size {l x m y r} : size (@node3R α l x m y r) = size l + size m + size r + 2 := by dsimp [node3R, node', size]; rw [← add_assoc, ← add_assoc] #align ordnode.node3_r_size Ordnode.node3R_size theorem node4L_size {l x m y r} (hm : Sized m) : size (@node4L α l x m y r) = size l + size m + size r + 2 := by cases m <;> simp [node4L, node3L, node'] <;> [abel; (simp [size, hm.1]; abel)] #align ordnode.node4_l_size Ordnode.node4L_size theorem Sized.dual : ∀ {t : Ordnode α}, Sized t → Sized (dual t) \| nil, _ => ⟨⟩ \| node _ l _ r, ⟨rfl, sl, sr⟩ => ⟨by simp [size_dual, add_comm], Sized.dual sr, Sized.dual sl⟩ #align ordnode.sized.dual Ordnode.Sized.dual theorem Sized.dual_iff {t : Ordnode α} : Sized (.dual t) ↔ Sized t := ⟨fun h => by rw [← dual_dual t]; exact h.dual, Sized.dual⟩ #align ordnode.sized.dual_iff Ordnode.Sized.dual_iff theorem Sized.rotateL {l x r} (hl : @Sized α l) (hr : Sized r) : Sized (rotateL l x r) := by cases r; · exact hl.node' hr rw [Ordnode.rotateL_node]; split_ifs · exact hl.node3L hr.2.1 hr.2.2 · exact hl.node4L hr.2.1 hr.2.2 #align ordnode.sized.rotate_l Ordnode.Sized.rotateL theorem Sized.rotateR {l x r} (hl : @Sized α l) (hr : Sized r) : Sized (rotateR l x r) := Sized.dual_iff.1 <\| by rw [dual_rotateR]; exact hr.dual.rotateL hl.dual #align ordnode.sized.rotate_r Ordnode.Sized.rotateR theorem Sized.rotateL_size {l x r} (hm : Sized r) : size (@Ordnode.rotateL α l x r) = size l + size r + 1 := by cases r <;> simp [Ordnode.rotateL] simp only [hm.1] split_ifs <;> simp [node3L_size, node4L_size hm.2.1] <;> abel #align ordnode.sized.rotate_l_size Ordnode.Sized.rotateL_size theorem Sized.rotateR_size {l x r} (hl : Sized l) : size (@Ordnode.rotateR α l x r) = size l + size r + 1 := by rw [← size_dual, dual_rotateR, hl.dual.rotateL_size, size_dual, size_dual, add_comm (size l)] #align ordnode.sized.rotate_r_size Ordnode.Sized.rotateR_size theorem Sized.balance' {l x r} (hl : @Sized α l) (hr : Sized r) : Sized (balance' l x r) := by unfold balance'; split_ifs · exact hl.node' hr · exact hl.rotateL hr · exact hl.rotateR hr · exact hl.node' hr #align ordnode.sized.balance' Ordnode.Sized.balance' theorem size_balance' {l x r} (hl : @Sized α l) (hr : Sized r) : size (@balance' α l x r) = size l + size r + 1 := by unfold balance'; split_ifs · rfl · exact hr.rotateL_size · exact hl.rotateR_size · rfl #align ordnode.size_balance' Ordnode.size_balance' theorem All.imp {P Q : α → Prop} (H : ∀ a, P a → Q a) : ∀ {t}, All P t → All Q t \| nil, _ => ⟨⟩ \| node _ _ _ _, ⟨h₁, h₂, h₃⟩ => ⟨h₁.imp H, H _ h₂, h₃.imp H⟩ #align ordnode.all.imp Ordnode.All.imp theorem Any.imp {P Q : α → Prop} (H : ∀ a, P a → Q a) : ∀ {t}, Any P t → Any Q t \| nil => id \| node _ _ _ _ => Or.imp (Any.imp H) <\| Or.imp (H _) (Any.imp H) #align ordnode.any.imp Ordnode.Any.imp theorem all_singleton {P : α → Prop} {x : α} : All P (singleton x) ↔ P x := ⟨fun h => h.2.1, fun h => ⟨⟨⟩, h, ⟨⟩⟩⟩ #align ordnode.all_singleton Ordnode.all_singleton theorem any_singleton {P : α → Prop} {x : α} : Any P (singleton x) ↔ P x := ⟨by rintro (⟨⟨⟩⟩ \| h \| ⟨⟨⟩⟩); exact h, fun h => Or.inr (Or.inl h)⟩ #align ordnode.any_singleton Ordnode.any_singleton theorem all_dual {P : α → Prop} : ∀ {t : Ordnode α}, All P (dual t) ↔ All P t \| nil => Iff.rfl \| node _ _l _x _r => ⟨fun ⟨hr, hx, hl⟩ => ⟨all_dual.1 hl, hx, all_dual.1 hr⟩, fun ⟨hl, hx, hr⟩ => ⟨all_dual.2 hr, hx, all_dual.2 hl⟩⟩ #align ordnode.all_dual Ordnode.all_dual theorem all_iff_forall {P : α → Prop} : ∀ {t}, All P t ↔ ∀ x, Emem x t → P x \| nil => (iff_true_intro <\| by rintro _ ⟨⟩).symm \| node _ l x r => by simp [All, Emem, all_iff_forall, Any, or_imp, forall_and] #align ordnode.all_iff_forall Ordnode.all_iff_forall theorem any_iff_exists {P : α → Prop} : ∀ {t}, Any P t ↔ ∃ x, Emem x t ∧ P x \| nil => ⟨by rintro ⟨⟩, by rintro ⟨_, ⟨⟩, _⟩⟩ \| node _ l x r => by simp only [Emem]; simp [Any, any_iff_exists, or_and_right, exists_or] #align ordnode.any_iff_exists Ordnode.any_iff_exists theorem emem_iff_all {x : α} {t} : Emem x t ↔ ∀ P, All P t → P x := ⟨fun h _ al => all_iff_forall.1 al _ h, fun H => H _ <\| all_iff_forall.2 fun _ => id⟩ #align ordnode.emem_iff_all Ordnode.emem_iff_all theorem all_node' {P l x r} : @All α P (node' l x r) ↔ All P l ∧ P x ∧ All P r := Iff.rfl #align ordnode.all_node' Ordnode.all_node' theorem all_node3L {P l x m y r} : @All α P (node3L l x m y r) ↔ All P l ∧ P x ∧ All P m ∧ P y ∧ All P r := by simp [node3L, all_node', and_assoc] #align ordnode.all_node3_l Ordnode.all_node3L theorem all_node3R {P l x m y r} : @All α P (node3R l x m y r) ↔ All P l ∧ P x ∧ All P m ∧ P y ∧ All P r := Iff.rfl #align ordnode.all_node3_r Ordnode.all_node3R theorem all_node4L {P l x m y r} : @All α P (node4L l x m y r) ↔ All P l ∧ P x ∧ All P m ∧ P y ∧ All P r := by cases m <;> simp [node4L, all_node', All, all_node3L, and_assoc] #align ordnode.all_node4_l Ordnode.all_node4L theorem all_node4R {P l x m y r} : @All α P (node4R l x m y r) ↔ All P l ∧ P x ∧ All P m ∧ P y ∧ All P r := by cases m <;> simp [node4R, all_node', All, all_node3R, and_assoc] #align ordnode.all_node4_r Ordnode.all_node4R theorem all_rotateL {P l x r} : @All α P (rotateL l x r) ↔ All P l ∧ P x ∧ All P r := by cases r <;> simp [rotateL, all_node']; split_ifs <;> simp [all_node3L, all_node4L, All, and_assoc] #align ordnode.all_rotate_l Ordnode.all_rotateL theorem all_rotateR {P l x r} : @All α P (rotateR l x r) ↔ All P l ∧ P x ∧ All P r := by rw [← all_dual, dual_rotateR, all_rotateL]; simp [all_dual, and_comm, and_left_comm, and_assoc] #align ordnode.all_rotate_r Ordnode.all_rotateR theorem all_balance' {P l x r} : @All α P (balance' l x r) ↔ All P l ∧ P x ∧ All P r := by rw [balance']; split_ifs <;> simp [all_node', all_rotateL, all_rotateR] #align ordnode.all_balance' Ordnode.all_balance' theorem foldr_cons_eq_toList : ∀ (t : Ordnode α) (r : List α), t.foldr List.cons r = toList t ++ r \| nil, r => rfl \| node _ l x r, r' => by rw [foldr, foldr_cons_eq_toList l, foldr_cons_eq_toList r, ← List.cons_append, ← List.append_assoc, ← foldr_cons_eq_toList l]; rfl #align ordnode.foldr_cons_eq_to_list Ordnode.foldr_cons_eq_toList @[simp] theorem toList_nil : toList (@nil α) = [] := rfl #align ordnode.to_list_nil Ordnode.toList_nil @[simp] theorem toList_node (s l x r) : toList (@node α s l x r) = toList l ++ x :: toList r := by rw [toList, foldr, foldr_cons_eq_toList]; rfl #align ordnode.to_list_node Ordnode.toList_node theorem emem_iff_mem_toList {x : α} {t} : Emem x t ↔ x ∈ toList t := by unfold Emem; induction t <;> simp [Any, *, or_assoc] #align ordnode.emem_iff_mem_to_list Ordnode.emem_iff_mem_toList theorem length_toList' : ∀ t : Ordnode α, (toList t).length = t.realSize \| nil => rfl \| node _ l _ r => by rw [toList_node, List.length_append, List.length_cons, length_toList' l, length_toList' r]; rfl #align ordnode.length_to_list' Ordnode.length_toList' theorem length_toList {t : Ordnode α} (h : Sized t) : (toList t).length = t.size := by rw [length_toList', size_eq_realSize h] #align ordnode.length_to_list Ordnode.length_toList theorem equiv_iff {t₁ t₂ : Ordnode α} (h₁ : Sized t₁) (h₂ : Sized t₂) : Equiv t₁ t₂ ↔ toList t₁ = toList t₂ := and_iff_right_of_imp fun h => by rw [← length_toList h₁, h, length_toList h₂] #align ordnode.equiv_iff Ordnode.equiv_iff	Mathlib/Data/Ordmap/Ordset.lean	574	575	theorem pos_size_of_mem [LE α] [@DecidableRel α (· ≤ ·)] {x : α} {t : Ordnode α} (h : Sized t) (h_mem : x ∈ t) : 0 < size t := by	cases t; · { contradiction }; · { simp [h.1] }
import Mathlib.Analysis.SpecialFunctions.Trigonometric.Complex #align_import analysis.special_functions.trigonometric.arctan from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" noncomputable section namespace Real open Set Filter open scoped Topology Real theorem tan_add {x y : ℝ} (h : ((∀ k : ℤ, x ≠ (2 * k + 1) * π / 2) ∧ ∀ l : ℤ, y ≠ (2 * l + 1) * π / 2) ∨ (∃ k : ℤ, x = (2 * k + 1) * π / 2) ∧ ∃ l : ℤ, y = (2 * l + 1) * π / 2) : tan (x + y) = (tan x + tan y) / (1 - tan x * tan y) := by simpa only [← Complex.ofReal_inj, Complex.ofReal_sub, Complex.ofReal_add, Complex.ofReal_div, Complex.ofReal_mul, Complex.ofReal_tan] using @Complex.tan_add (x : ℂ) (y : ℂ) (by convert h <;> norm_cast) #align real.tan_add Real.tan_add theorem tan_add' {x y : ℝ} (h : (∀ k : ℤ, x ≠ (2 * k + 1) * π / 2) ∧ ∀ l : ℤ, y ≠ (2 * l + 1) * π / 2) : tan (x + y) = (tan x + tan y) / (1 - tan x * tan y) := tan_add (Or.inl h) #align real.tan_add' Real.tan_add' theorem tan_two_mul {x : ℝ} : tan (2 * x) = 2 * tan x / (1 - tan x ^ 2) := by have := @Complex.tan_two_mul x norm_cast at * #align real.tan_two_mul Real.tan_two_mul theorem tan_int_mul_pi_div_two (n : ℤ) : tan (n * π / 2) = 0 := tan_eq_zero_iff.mpr (by use n) #align real.tan_int_mul_pi_div_two Real.tan_int_mul_pi_div_two theorem continuousOn_tan : ContinuousOn tan {x \| cos x ≠ 0} := by suffices ContinuousOn (fun x => sin x / cos x) {x \| cos x ≠ 0} by have h_eq : (fun x => sin x / cos x) = tan := by ext1 x; rw [tan_eq_sin_div_cos] rwa [h_eq] at this exact continuousOn_sin.div continuousOn_cos fun x => id #align real.continuous_on_tan Real.continuousOn_tan @[continuity] theorem continuous_tan : Continuous fun x : {x \| cos x ≠ 0} => tan x := continuousOn_iff_continuous_restrict.1 continuousOn_tan #align real.continuous_tan Real.continuous_tan theorem continuousOn_tan_Ioo : ContinuousOn tan (Ioo (-(π / 2)) (π / 2)) := by refine ContinuousOn.mono continuousOn_tan fun x => ?_ simp only [and_imp, mem_Ioo, mem_setOf_eq, Ne] rw [cos_eq_zero_iff] rintro hx_gt hx_lt ⟨r, hxr_eq⟩ rcases le_or_lt 0 r with h \| h · rw [lt_iff_not_ge] at hx_lt refine hx_lt ?_ rw [hxr_eq, ← one_mul (π / 2), mul_div_assoc, ge_iff_le, mul_le_mul_right (half_pos pi_pos)] simp [h] · rw [lt_iff_not_ge] at hx_gt refine hx_gt ?_ rw [hxr_eq, ← one_mul (π / 2), mul_div_assoc, ge_iff_le, neg_mul_eq_neg_mul, mul_le_mul_right (half_pos pi_pos)] have hr_le : r ≤ -1 := by rwa [Int.lt_iff_add_one_le, ← le_neg_iff_add_nonpos_right] at h rw [← le_sub_iff_add_le, mul_comm, ← le_div_iff] · set_option tactic.skipAssignedInstances false in norm_num rw [← Int.cast_one, ← Int.cast_neg]; norm_cast · exact zero_lt_two #align real.continuous_on_tan_Ioo Real.continuousOn_tan_Ioo theorem surjOn_tan : SurjOn tan (Ioo (-(π / 2)) (π / 2)) univ := have := neg_lt_self pi_div_two_pos continuousOn_tan_Ioo.surjOn_of_tendsto (nonempty_Ioo.2 this) (by rw [tendsto_comp_coe_Ioo_atBot this]; exact tendsto_tan_neg_pi_div_two) (by rw [tendsto_comp_coe_Ioo_atTop this]; exact tendsto_tan_pi_div_two) #align real.surj_on_tan Real.surjOn_tan theorem tan_surjective : Function.Surjective tan := fun _ => surjOn_tan.subset_range trivial #align real.tan_surjective Real.tan_surjective theorem image_tan_Ioo : tan '' Ioo (-(π / 2)) (π / 2) = univ := univ_subset_iff.1 surjOn_tan #align real.image_tan_Ioo Real.image_tan_Ioo def tanOrderIso : Ioo (-(π / 2)) (π / 2) ≃o ℝ := (strictMonoOn_tan.orderIso _ _).trans <\| (OrderIso.setCongr _ _ image_tan_Ioo).trans OrderIso.Set.univ #align real.tan_order_iso Real.tanOrderIso -- @[pp_nodot] -- Porting note: removed noncomputable def arctan (x : ℝ) : ℝ := tanOrderIso.symm x #align real.arctan Real.arctan @[simp] theorem tan_arctan (x : ℝ) : tan (arctan x) = x := tanOrderIso.apply_symm_apply x #align real.tan_arctan Real.tan_arctan theorem arctan_mem_Ioo (x : ℝ) : arctan x ∈ Ioo (-(π / 2)) (π / 2) := Subtype.coe_prop _ #align real.arctan_mem_Ioo Real.arctan_mem_Ioo @[simp] theorem range_arctan : range arctan = Ioo (-(π / 2)) (π / 2) := ((EquivLike.surjective _).range_comp _).trans Subtype.range_coe #align real.range_arctan Real.range_arctan theorem arctan_tan {x : ℝ} (hx₁ : -(π / 2) < x) (hx₂ : x < π / 2) : arctan (tan x) = x := Subtype.ext_iff.1 <\| tanOrderIso.symm_apply_apply ⟨x, hx₁, hx₂⟩ #align real.arctan_tan Real.arctan_tan theorem cos_arctan_pos (x : ℝ) : 0 < cos (arctan x) := cos_pos_of_mem_Ioo <\| arctan_mem_Ioo x #align real.cos_arctan_pos Real.cos_arctan_pos theorem cos_sq_arctan (x : ℝ) : cos (arctan x) ^ 2 = 1 / (1 + x ^ 2) := by rw_mod_cast [one_div, ← inv_one_add_tan_sq (cos_arctan_pos x).ne', tan_arctan] #align real.cos_sq_arctan Real.cos_sq_arctan	Mathlib/Analysis/SpecialFunctions/Trigonometric/Arctan.lean	142	143	theorem sin_arctan (x : ℝ) : sin (arctan x) = x / √(1 + x ^ 2) := by	rw_mod_cast [← tan_div_sqrt_one_add_tan_sq (cos_arctan_pos x), tan_arctan]
import Mathlib.RingTheory.Derivation.ToSquareZero import Mathlib.RingTheory.Ideal.Cotangent import Mathlib.RingTheory.IsTensorProduct import Mathlib.Algebra.Exact import Mathlib.Algebra.MvPolynomial.PDeriv import Mathlib.Algebra.Polynomial.Derivation #align_import ring_theory.kaehler from "leanprover-community/mathlib"@"4b92a463033b5587bb011657e25e4710bfca7364" suppress_compilation section KaehlerDifferential open scoped TensorProduct open Algebra universe u v variable (R : Type u) (S : Type v) [CommRing R] [CommRing S] [Algebra R S] abbrev KaehlerDifferential.ideal : Ideal (S ⊗[R] S) := RingHom.ker (TensorProduct.lmul' R : S ⊗[R] S →ₐ[R] S) #align kaehler_differential.ideal KaehlerDifferential.ideal variable {S} theorem KaehlerDifferential.one_smul_sub_smul_one_mem_ideal (a : S) : (1 : S) ⊗ₜ[R] a - a ⊗ₜ[R] (1 : S) ∈ KaehlerDifferential.ideal R S := by simp [RingHom.mem_ker] #align kaehler_differential.one_smul_sub_smul_one_mem_ideal KaehlerDifferential.one_smul_sub_smul_one_mem_ideal variable {R} variable {M : Type} [AddCommGroup M] [Module R M] [Module S M] [IsScalarTower R S M] def Derivation.tensorProductTo (D : Derivation R S M) : S ⊗[R] S →ₗ[S] M := TensorProduct.AlgebraTensorModule.lift ((LinearMap.lsmul S (S →ₗ[R] M)).flip D.toLinearMap) #align derivation.tensor_product_to Derivation.tensorProductTo theorem Derivation.tensorProductTo_tmul (D : Derivation R S M) (s t : S) : D.tensorProductTo (s ⊗ₜ t) = s • D t := rfl #align derivation.tensor_product_to_tmul Derivation.tensorProductTo_tmul theorem Derivation.tensorProductTo_mul (D : Derivation R S M) (x y : S ⊗[R] S) : D.tensorProductTo (x y) = TensorProduct.lmul' (S := S) R x • D.tensorProductTo y + TensorProduct.lmul' (S := S) R y • D.tensorProductTo x := by refine TensorProduct.induction_on x ?_ ?_ ?_ · rw [zero_mul, map_zero, map_zero, zero_smul, smul_zero, add_zero] swap · intro x₁ y₁ h₁ h₂ rw [add_mul, map_add, map_add, map_add, add_smul, smul_add, h₁, h₂, add_add_add_comm] intro x₁ x₂ refine TensorProduct.induction_on y ?_ ?_ ?_ · rw [mul_zero, map_zero, map_zero, zero_smul, smul_zero, add_zero] swap · intro x₁ y₁ h₁ h₂ rw [mul_add, map_add, map_add, map_add, add_smul, smul_add, h₁, h₂, add_add_add_comm] intro x y simp only [TensorProduct.tmul_mul_tmul, Derivation.tensorProductTo, TensorProduct.AlgebraTensorModule.lift_apply, TensorProduct.lift.tmul', TensorProduct.lmul'_apply_tmul] dsimp rw [D.leibniz] simp only [smul_smul, smul_add, mul_comm (x * y) x₁, mul_right_comm x₁ x₂, ← mul_assoc] #align derivation.tensor_product_to_mul Derivation.tensorProductTo_mul variable (R S) theorem KaehlerDifferential.submodule_span_range_eq_ideal : Submodule.span S (Set.range fun s : S => (1 : S) ⊗ₜ[R] s - s ⊗ₜ[R] (1 : S)) = (KaehlerDifferential.ideal R S).restrictScalars S := by apply le_antisymm · rw [Submodule.span_le] rintro _ ⟨s, rfl⟩ exact KaehlerDifferential.one_smul_sub_smul_one_mem_ideal _ _ · rintro x (hx : _ = _) have : x - TensorProduct.lmul' (S := S) R x ⊗ₜ[R] (1 : S) = x := by rw [hx, TensorProduct.zero_tmul, sub_zero] rw [← this] clear this hx refine TensorProduct.induction_on x ?_ ?_ ?_ · rw [map_zero, TensorProduct.zero_tmul, sub_zero]; exact zero_mem _ · intro x y have : x ⊗ₜ[R] y - (x * y) ⊗ₜ[R] (1 : S) = x • ((1 : S) ⊗ₜ y - y ⊗ₜ (1 : S)) := by simp_rw [smul_sub, TensorProduct.smul_tmul', smul_eq_mul, mul_one] rw [TensorProduct.lmul'_apply_tmul, this] refine Submodule.smul_mem _ x ?_ apply Submodule.subset_span exact Set.mem_range_self y · intro x y hx hy rw [map_add, TensorProduct.add_tmul, ← sub_add_sub_comm] exact add_mem hx hy #align kaehler_differential.submodule_span_range_eq_ideal KaehlerDifferential.submodule_span_range_eq_ideal theorem KaehlerDifferential.span_range_eq_ideal : Ideal.span (Set.range fun s : S => (1 : S) ⊗ₜ[R] s - s ⊗ₜ[R] (1 : S)) = KaehlerDifferential.ideal R S := by apply le_antisymm · rw [Ideal.span_le] rintro _ ⟨s, rfl⟩ exact KaehlerDifferential.one_smul_sub_smul_one_mem_ideal _ _ · change (KaehlerDifferential.ideal R S).restrictScalars S ≤ (Ideal.span _).restrictScalars S rw [← KaehlerDifferential.submodule_span_range_eq_ideal, Ideal.span] conv_rhs => rw [← Submodule.span_span_of_tower S] exact Submodule.subset_span #align kaehler_differential.span_range_eq_ideal KaehlerDifferential.span_range_eq_ideal def KaehlerDifferential : Type v := (KaehlerDifferential.ideal R S).Cotangent #align kaehler_differential KaehlerDifferential instance : AddCommGroup (KaehlerDifferential R S) := by unfold KaehlerDifferential infer_instance instance KaehlerDifferential.module : Module (S ⊗[R] S) (KaehlerDifferential R S) := Ideal.Cotangent.moduleOfTower _ #align kaehler_differential.module KaehlerDifferential.module @[inherit_doc KaehlerDifferential] notation:100 "Ω[" S "⁄" R "]" => KaehlerDifferential R S instance : Nonempty (Ω[S⁄R]) := ⟨0⟩ instance KaehlerDifferential.module' {R' : Type} [CommRing R'] [Algebra R' S] [SMulCommClass R R' S] : Module R' (Ω[S⁄R]) := Submodule.Quotient.module' _ #align kaehler_differential.module' KaehlerDifferential.module' instance : IsScalarTower S (S ⊗[R] S) (Ω[S⁄R]) := Ideal.Cotangent.isScalarTower _ instance KaehlerDifferential.isScalarTower_of_tower {R₁ R₂ : Type} [CommRing R₁] [CommRing R₂] [Algebra R₁ S] [Algebra R₂ S] [SMul R₁ R₂] [SMulCommClass R R₁ S] [SMulCommClass R R₂ S] [IsScalarTower R₁ R₂ S] : IsScalarTower R₁ R₂ (Ω[S⁄R]) := Submodule.Quotient.isScalarTower _ _ #align kaehler_differential.is_scalar_tower_of_tower KaehlerDifferential.isScalarTower_of_tower instance KaehlerDifferential.isScalarTower' : IsScalarTower R (S ⊗[R] S) (Ω[S⁄R]) := Submodule.Quotient.isScalarTower _ _ #align kaehler_differential.is_scalar_tower' KaehlerDifferential.isScalarTower' def KaehlerDifferential.fromIdeal : KaehlerDifferential.ideal R S →ₗ[S ⊗[R] S] Ω[S⁄R] := (KaehlerDifferential.ideal R S).toCotangent #align kaehler_differential.from_ideal KaehlerDifferential.fromIdeal def KaehlerDifferential.DLinearMap : S →ₗ[R] Ω[S⁄R] := ((KaehlerDifferential.fromIdeal R S).restrictScalars R).comp ((TensorProduct.includeRight.toLinearMap - TensorProduct.includeLeft.toLinearMap : S →ₗ[R] S ⊗[R] S).codRestrict ((KaehlerDifferential.ideal R S).restrictScalars R) (KaehlerDifferential.one_smul_sub_smul_one_mem_ideal R) : _ →ₗ[R] _) set_option linter.uppercaseLean3 false in #align kaehler_differential.D_linear_map KaehlerDifferential.DLinearMap theorem KaehlerDifferential.DLinearMap_apply (s : S) : KaehlerDifferential.DLinearMap R S s = (KaehlerDifferential.ideal R S).toCotangent ⟨1 ⊗ₜ s - s ⊗ₜ 1, KaehlerDifferential.one_smul_sub_smul_one_mem_ideal R s⟩ := rfl set_option linter.uppercaseLean3 false in #align kaehler_differential.D_linear_map_apply KaehlerDifferential.DLinearMap_apply def KaehlerDifferential.D : Derivation R S (Ω[S⁄R]) := { toLinearMap := KaehlerDifferential.DLinearMap R S map_one_eq_zero' := by dsimp [KaehlerDifferential.DLinearMap_apply, Ideal.toCotangent_apply] congr rw [sub_self] leibniz' := fun a b => by have : LinearMap.CompatibleSMul { x // x ∈ ideal R S } (Ω[S⁄R]) S (S ⊗[R] S) := inferInstance dsimp [KaehlerDifferential.DLinearMap_apply] -- This used to be `rw`, but we need `erw` after leanprover/lean4#2644 erw [← LinearMap.map_smul_of_tower (M₂ := Ω[S⁄R]), ← LinearMap.map_smul_of_tower (M₂ := Ω[S⁄R]), ← map_add, Ideal.toCotangent_eq, pow_two] convert Submodule.mul_mem_mul (KaehlerDifferential.one_smul_sub_smul_one_mem_ideal R a : _) (KaehlerDifferential.one_smul_sub_smul_one_mem_ideal R b : _) using 1 simp only [AddSubgroupClass.coe_sub, Submodule.coe_add, Submodule.coe_mk, TensorProduct.tmul_mul_tmul, mul_sub, sub_mul, mul_comm b, Submodule.coe_smul_of_tower, smul_sub, TensorProduct.smul_tmul', smul_eq_mul, mul_one] ring_nf } set_option linter.uppercaseLean3 false in #align kaehler_differential.D KaehlerDifferential.D theorem KaehlerDifferential.D_apply (s : S) : KaehlerDifferential.D R S s = (KaehlerDifferential.ideal R S).toCotangent ⟨1 ⊗ₜ s - s ⊗ₜ 1, KaehlerDifferential.one_smul_sub_smul_one_mem_ideal R s⟩ := rfl set_option linter.uppercaseLean3 false in #align kaehler_differential.D_apply KaehlerDifferential.D_apply theorem KaehlerDifferential.span_range_derivation : Submodule.span S (Set.range <\| KaehlerDifferential.D R S) = ⊤ := by rw [_root_.eq_top_iff] rintro x - obtain ⟨⟨x, hx⟩, rfl⟩ := Ideal.toCotangent_surjective _ x have : x ∈ (KaehlerDifferential.ideal R S).restrictScalars S := hx rw [← KaehlerDifferential.submodule_span_range_eq_ideal] at this suffices ∃ hx, (KaehlerDifferential.ideal R S).toCotangent ⟨x, hx⟩ ∈ Submodule.span S (Set.range <\| KaehlerDifferential.D R S) by exact this.choose_spec refine Submodule.span_induction this ?_ ?_ ?_ ?_ · rintro _ ⟨x, rfl⟩ refine ⟨KaehlerDifferential.one_smul_sub_smul_one_mem_ideal R x, ?_⟩ apply Submodule.subset_span exact ⟨x, KaehlerDifferential.DLinearMap_apply R S x⟩ · exact ⟨zero_mem _, Submodule.zero_mem _⟩ · rintro x y ⟨hx₁, hx₂⟩ ⟨hy₁, hy₂⟩; exact ⟨add_mem hx₁ hy₁, Submodule.add_mem _ hx₂ hy₂⟩ · rintro r x ⟨hx₁, hx₂⟩; exact ⟨((KaehlerDifferential.ideal R S).restrictScalars S).smul_mem r hx₁, Submodule.smul_mem _ r hx₂⟩ #align kaehler_differential.span_range_derivation KaehlerDifferential.span_range_derivation variable {R S} def Derivation.liftKaehlerDifferential (D : Derivation R S M) : Ω[S⁄R] →ₗ[S] M := by refine LinearMap.comp ((((KaehlerDifferential.ideal R S) • (⊤ : Submodule (S ⊗[R] S) (KaehlerDifferential.ideal R S))).restrictScalars S).liftQ ?_ ?_) (Submodule.Quotient.restrictScalarsEquiv S _).symm.toLinearMap · exact D.tensorProductTo.comp ((KaehlerDifferential.ideal R S).subtype.restrictScalars S) · intro x hx rw [LinearMap.mem_ker] refine Submodule.smul_induction_on hx ?_ ?_ · rintro x hx y - rw [RingHom.mem_ker] at hx dsimp rw [Derivation.tensorProductTo_mul, hx, y.prop, zero_smul, zero_smul, zero_add] · intro x y ex ey; rw [map_add, ex, ey, zero_add] #align derivation.lift_kaehler_differential Derivation.liftKaehlerDifferential theorem Derivation.liftKaehlerDifferential_apply (D : Derivation R S M) (x) : D.liftKaehlerDifferential ((KaehlerDifferential.ideal R S).toCotangent x) = D.tensorProductTo x := rfl #align derivation.lift_kaehler_differential_apply Derivation.liftKaehlerDifferential_apply theorem Derivation.liftKaehlerDifferential_comp (D : Derivation R S M) : D.liftKaehlerDifferential.compDer (KaehlerDifferential.D R S) = D := by ext a dsimp [KaehlerDifferential.D_apply] refine (D.liftKaehlerDifferential_apply _).trans ?_ rw [Subtype.coe_mk, map_sub, Derivation.tensorProductTo_tmul, Derivation.tensorProductTo_tmul, one_smul, D.map_one_eq_zero, smul_zero, sub_zero] #align derivation.lift_kaehler_differential_comp Derivation.liftKaehlerDifferential_comp @[simp] theorem Derivation.liftKaehlerDifferential_comp_D (D' : Derivation R S M) (x : S) : D'.liftKaehlerDifferential (KaehlerDifferential.D R S x) = D' x := Derivation.congr_fun D'.liftKaehlerDifferential_comp x set_option linter.uppercaseLean3 false in #align derivation.lift_kaehler_differential_comp_D Derivation.liftKaehlerDifferential_comp_D @[ext] theorem Derivation.liftKaehlerDifferential_unique (f f' : Ω[S⁄R] →ₗ[S] M) (hf : f.compDer (KaehlerDifferential.D R S) = f'.compDer (KaehlerDifferential.D R S)) : f = f' := by apply LinearMap.ext intro x have : x ∈ Submodule.span S (Set.range <\| KaehlerDifferential.D R S) := by rw [KaehlerDifferential.span_range_derivation]; trivial refine Submodule.span_induction this ?_ ?_ ?_ ?_ · rintro _ ⟨x, rfl⟩; exact congr_arg (fun D : Derivation R S M => D x) hf · rw [map_zero, map_zero] · intro x y hx hy; rw [map_add, map_add, hx, hy] · intro a x e; simp [e] #align derivation.lift_kaehler_differential_unique Derivation.liftKaehlerDifferential_unique variable (R S) theorem Derivation.liftKaehlerDifferential_D : (KaehlerDifferential.D R S).liftKaehlerDifferential = LinearMap.id := Derivation.liftKaehlerDifferential_unique _ _ (KaehlerDifferential.D R S).liftKaehlerDifferential_comp set_option linter.uppercaseLean3 false in #align derivation.lift_kaehler_differential_D Derivation.liftKaehlerDifferential_D variable {R S} theorem KaehlerDifferential.D_tensorProductTo (x : KaehlerDifferential.ideal R S) : (KaehlerDifferential.D R S).tensorProductTo x = (KaehlerDifferential.ideal R S).toCotangent x := by rw [← Derivation.liftKaehlerDifferential_apply, Derivation.liftKaehlerDifferential_D] rfl set_option linter.uppercaseLean3 false in #align kaehler_differential.D_tensor_product_to KaehlerDifferential.D_tensorProductTo variable (R S) theorem KaehlerDifferential.tensorProductTo_surjective : Function.Surjective (KaehlerDifferential.D R S).tensorProductTo := by intro x; obtain ⟨x, rfl⟩ := (KaehlerDifferential.ideal R S).toCotangent_surjective x exact ⟨x, KaehlerDifferential.D_tensorProductTo x⟩ #align kaehler_differential.tensor_product_to_surjective KaehlerDifferential.tensorProductTo_surjective @[simps! symm_apply apply_apply] def KaehlerDifferential.linearMapEquivDerivation : (Ω[S⁄R] →ₗ[S] M) ≃ₗ[S] Derivation R S M := { Derivation.llcomp.flip <\| KaehlerDifferential.D R S with invFun := Derivation.liftKaehlerDifferential left_inv := fun _ => Derivation.liftKaehlerDifferential_unique _ _ (Derivation.liftKaehlerDifferential_comp _) right_inv := Derivation.liftKaehlerDifferential_comp } #align kaehler_differential.linear_map_equiv_derivation KaehlerDifferential.linearMapEquivDerivation def KaehlerDifferential.quotientCotangentIdealRingEquiv : (S ⊗ S ⧸ KaehlerDifferential.ideal R S ^ 2) ⧸ (KaehlerDifferential.ideal R S).cotangentIdeal ≃+* S := by have : Function.RightInverse (TensorProduct.includeLeft (R := R) (S := R) (A := S) (B := S)) (↑(TensorProduct.lmul' R : S ⊗[R] S →ₐ[R] S) : S ⊗[R] S →+* S) := by intro x; rw [AlgHom.coe_toRingHom, ← AlgHom.comp_apply, TensorProduct.lmul'_comp_includeLeft] rfl refine (Ideal.quotCotangent _).trans ?_ refine (Ideal.quotEquivOfEq ?_).trans (RingHom.quotientKerEquivOfRightInverse this) ext; rfl #align kaehler_differential.quotient_cotangent_ideal_ring_equiv KaehlerDifferential.quotientCotangentIdealRingEquiv def KaehlerDifferential.quotientCotangentIdeal : ((S ⊗ S ⧸ KaehlerDifferential.ideal R S ^ 2) ⧸ (KaehlerDifferential.ideal R S).cotangentIdeal) ≃ₐ[S] S := { KaehlerDifferential.quotientCotangentIdealRingEquiv R S with commutes' := (KaehlerDifferential.quotientCotangentIdealRingEquiv R S).apply_symm_apply } #align kaehler_differential.quotient_cotangent_ideal KaehlerDifferential.quotientCotangentIdeal theorem KaehlerDifferential.End_equiv_aux (f : S →ₐ[R] S ⊗ S ⧸ KaehlerDifferential.ideal R S ^ 2) : (Ideal.Quotient.mkₐ R (KaehlerDifferential.ideal R S).cotangentIdeal).comp f = IsScalarTower.toAlgHom R S _ ↔ (TensorProduct.lmul' R : S ⊗[R] S →ₐ[R] S).kerSquareLift.comp f = AlgHom.id R S := by rw [AlgHom.ext_iff, AlgHom.ext_iff] apply forall_congr' intro x have e₁ : (TensorProduct.lmul' R : S ⊗[R] S →ₐ[R] S).kerSquareLift (f x) = KaehlerDifferential.quotientCotangentIdealRingEquiv R S (Ideal.Quotient.mk (KaehlerDifferential.ideal R S).cotangentIdeal <\| f x) := by generalize f x = y; obtain ⟨y, rfl⟩ := Ideal.Quotient.mk_surjective y; rfl have e₂ : x = KaehlerDifferential.quotientCotangentIdealRingEquiv R S (IsScalarTower.toAlgHom R S _ x) := (mul_one x).symm constructor · intro e exact (e₁.trans (@RingEquiv.congr_arg _ _ _ _ _ _ (KaehlerDifferential.quotientCotangentIdealRingEquiv R S) _ _ e)).trans e₂.symm · intro e; apply (KaehlerDifferential.quotientCotangentIdealRingEquiv R S).injective exact e₁.symm.trans (e.trans e₂) #align kaehler_differential.End_equiv_aux KaehlerDifferential.End_equiv_aux local instance smul_SSmod_SSmod : SMul (S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2) (S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2) := Mul.toSMul _ @[nolint defLemma] local instance isScalarTower_S_right : IsScalarTower S (S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2) (S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2) := Ideal.Quotient.isScalarTower_right @[nolint defLemma] local instance isScalarTower_R_right : IsScalarTower R (S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2) (S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2) := Ideal.Quotient.isScalarTower_right @[nolint defLemma] local instance isScalarTower_SS_right : IsScalarTower (S ⊗[R] S) (S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2) (S ⊗[R] S ⧸ KaehlerDifferential.ideal R S ^ 2) := Ideal.Quotient.isScalarTower_right local instance instS : Module S (KaehlerDifferential.ideal R S).cotangentIdeal := Submodule.module' _ local instance instR : Module R (KaehlerDifferential.ideal R S).cotangentIdeal := Submodule.module' _ local instance instSS : Module (S ⊗[R] S) (KaehlerDifferential.ideal R S).cotangentIdeal := Submodule.module' _ noncomputable def KaehlerDifferential.endEquivDerivation' : Derivation R S (Ω[S⁄R]) ≃ₗ[R] Derivation R S (ideal R S).cotangentIdeal := LinearEquiv.compDer ((KaehlerDifferential.ideal R S).cotangentEquivIdeal.restrictScalars S) #align kaehler_differential.End_equiv_derivation' KaehlerDifferential.endEquivDerivation' def KaehlerDifferential.endEquivAuxEquiv : { f // (Ideal.Quotient.mkₐ R (KaehlerDifferential.ideal R S).cotangentIdeal).comp f = IsScalarTower.toAlgHom R S _ } ≃ { f // (TensorProduct.lmul' R : S ⊗[R] S →ₐ[R] S).kerSquareLift.comp f = AlgHom.id R S } := (Equiv.refl _).subtypeEquiv (KaehlerDifferential.End_equiv_aux R S) #align kaehler_differential.End_equiv_aux_equiv KaehlerDifferential.endEquivAuxEquiv noncomputable def KaehlerDifferential.endEquiv : Module.End S (Ω[S⁄R]) ≃ { f // (TensorProduct.lmul' R : S ⊗[R] S →ₐ[R] S).kerSquareLift.comp f = AlgHom.id R S } := (KaehlerDifferential.linearMapEquivDerivation R S).toEquiv.trans <\| (KaehlerDifferential.endEquivDerivation' R S).toEquiv.trans <\| (derivationToSquareZeroEquivLift (KaehlerDifferential.ideal R S).cotangentIdeal (KaehlerDifferential.ideal R S).cotangentIdeal_square).trans <\| KaehlerDifferential.endEquivAuxEquiv R S #align kaehler_differential.End_equiv KaehlerDifferential.endEquiv section Presentation open KaehlerDifferential (D) open Finsupp (single) noncomputable def KaehlerDifferential.kerTotal : Submodule S (S →₀ S) := Submodule.span S (((Set.range fun x : S × S => single x.1 1 + single x.2 1 - single (x.1 + x.2) 1) ∪ Set.range fun x : S × S => single x.2 x.1 + single x.1 x.2 - single (x.1 * x.2) 1) ∪ Set.range fun x : R => single (algebraMap R S x) 1) #align kaehler_differential.ker_total KaehlerDifferential.kerTotal unsuppress_compilation in -- Porting note: was `local notation x "𝖣" y => (KaehlerDifferential.kerTotal R S).mkQ (single y x)` -- but not having `DFunLike.coe` leads to `kerTotal_mkQ_single_smul` failing. local notation3 x "𝖣" y => DFunLike.coe (KaehlerDifferential.kerTotal R S).mkQ (single y x) theorem KaehlerDifferential.kerTotal_mkQ_single_add (x y z) : (z𝖣x + y) = (z𝖣x) + z𝖣y := by rw [← map_add, eq_comm, ← sub_eq_zero, ← map_sub (Submodule.mkQ (kerTotal R S)), Submodule.mkQ_apply, Submodule.Quotient.mk_eq_zero] simp_rw [← Finsupp.smul_single_one _ z, ← smul_add, ← smul_sub] exact Submodule.smul_mem _ _ (Submodule.subset_span (Or.inl <\| Or.inl <\| ⟨⟨_, _⟩, rfl⟩)) #align kaehler_differential.ker_total_mkq_single_add KaehlerDifferential.kerTotal_mkQ_single_add theorem KaehlerDifferential.kerTotal_mkQ_single_mul (x y z) : (z𝖣x * y) = ((z * x)𝖣y) + (z * y)𝖣x := by rw [← map_add, eq_comm, ← sub_eq_zero, ← map_sub (Submodule.mkQ (kerTotal R S)), Submodule.mkQ_apply, Submodule.Quotient.mk_eq_zero] simp_rw [← Finsupp.smul_single_one _ z, ← @smul_eq_mul _ _ z, ← Finsupp.smul_single, ← smul_add, ← smul_sub] exact Submodule.smul_mem _ _ (Submodule.subset_span (Or.inl <\| Or.inr <\| ⟨⟨_, _⟩, rfl⟩)) #align kaehler_differential.ker_total_mkq_single_mul KaehlerDifferential.kerTotal_mkQ_single_mul theorem KaehlerDifferential.kerTotal_mkQ_single_algebraMap (x y) : (y𝖣algebraMap R S x) = 0 := by rw [Submodule.mkQ_apply, Submodule.Quotient.mk_eq_zero, ← Finsupp.smul_single_one _ y] exact Submodule.smul_mem _ _ (Submodule.subset_span (Or.inr <\| ⟨_, rfl⟩)) #align kaehler_differential.ker_total_mkq_single_algebra_map KaehlerDifferential.kerTotal_mkQ_single_algebraMap theorem KaehlerDifferential.kerTotal_mkQ_single_algebraMap_one (x) : (x𝖣1) = 0 := by rw [← (algebraMap R S).map_one, KaehlerDifferential.kerTotal_mkQ_single_algebraMap] #align kaehler_differential.ker_total_mkq_single_algebra_map_one KaehlerDifferential.kerTotal_mkQ_single_algebraMap_one theorem KaehlerDifferential.kerTotal_mkQ_single_smul (r : R) (x y) : (y𝖣r • x) = r • y𝖣x := by letI : SMulZeroClass R S := inferInstance rw [Algebra.smul_def, KaehlerDifferential.kerTotal_mkQ_single_mul, KaehlerDifferential.kerTotal_mkQ_single_algebraMap, add_zero, ← LinearMap.map_smul_of_tower, Finsupp.smul_single, mul_comm, Algebra.smul_def] #align kaehler_differential.ker_total_mkq_single_smul KaehlerDifferential.kerTotal_mkQ_single_smul noncomputable def KaehlerDifferential.derivationQuotKerTotal : Derivation R S ((S →₀ S) ⧸ KaehlerDifferential.kerTotal R S) where toFun x := 1𝖣x map_add' x y := KaehlerDifferential.kerTotal_mkQ_single_add _ _ _ _ _ map_smul' r s := KaehlerDifferential.kerTotal_mkQ_single_smul _ _ _ _ _ map_one_eq_zero' := KaehlerDifferential.kerTotal_mkQ_single_algebraMap_one _ _ _ leibniz' a b := (KaehlerDifferential.kerTotal_mkQ_single_mul _ _ _ _ _).trans (by simp_rw [← Finsupp.smul_single_one _ (1 * _ : S)]; dsimp; simp) #align kaehler_differential.derivation_quot_ker_total KaehlerDifferential.derivationQuotKerTotal theorem KaehlerDifferential.derivationQuotKerTotal_apply (x) : KaehlerDifferential.derivationQuotKerTotal R S x = 1𝖣x := rfl #align kaehler_differential.derivation_quot_ker_total_apply KaehlerDifferential.derivationQuotKerTotal_apply theorem KaehlerDifferential.derivationQuotKerTotal_lift_comp_total : (KaehlerDifferential.derivationQuotKerTotal R S).liftKaehlerDifferential.comp (Finsupp.total S (Ω[S⁄R]) S (KaehlerDifferential.D R S)) = Submodule.mkQ _ := by apply Finsupp.lhom_ext intro a b conv_rhs => rw [← Finsupp.smul_single_one a b, LinearMap.map_smul] simp [KaehlerDifferential.derivationQuotKerTotal_apply] #align kaehler_differential.derivation_quot_ker_total_lift_comp_total KaehlerDifferential.derivationQuotKerTotal_lift_comp_total theorem KaehlerDifferential.kerTotal_eq : LinearMap.ker (Finsupp.total S (Ω[S⁄R]) S (KaehlerDifferential.D R S)) = KaehlerDifferential.kerTotal R S := by apply le_antisymm · conv_rhs => rw [← (KaehlerDifferential.kerTotal R S).ker_mkQ] rw [← KaehlerDifferential.derivationQuotKerTotal_lift_comp_total] exact LinearMap.ker_le_ker_comp _ _ · rw [KaehlerDifferential.kerTotal, Submodule.span_le] rintro _ ((⟨⟨x, y⟩, rfl⟩ \| ⟨⟨x, y⟩, rfl⟩) \| ⟨x, rfl⟩) <;> dsimp <;> simp [LinearMap.mem_ker] #align kaehler_differential.ker_total_eq KaehlerDifferential.kerTotal_eq	Mathlib/RingTheory/Kaehler.lean	565	567	theorem KaehlerDifferential.total_surjective : Function.Surjective (Finsupp.total S (Ω[S⁄R]) S (KaehlerDifferential.D R S)) := by	rw [← LinearMap.range_eq_top, Finsupp.range_total, KaehlerDifferential.span_range_derivation]
import Mathlib.CategoryTheory.Limits.IsLimit import Mathlib.CategoryTheory.Category.ULift import Mathlib.CategoryTheory.EssentiallySmall import Mathlib.Logic.Equiv.Basic #align_import category_theory.limits.has_limits from "leanprover-community/mathlib"@"2738d2ca56cbc63be80c3bd48e9ed90ad94e947d" noncomputable section open CategoryTheory CategoryTheory.Category CategoryTheory.Functor Opposite namespace CategoryTheory.Limits -- morphism levels before object levels. See note [CategoryTheory universes]. universe v₁ u₁ v₂ u₂ v₃ u₃ v v' v'' u u' u'' variable {J : Type u₁} [Category.{v₁} J] {K : Type u₂} [Category.{v₂} K] variable {C : Type u} [Category.{v} C] variable {F : J ⥤ C} section Limit -- @[nolint has_nonempty_instance] -- Porting note(#5171): removed; linter not ported yet structure LimitCone (F : J ⥤ C) where cone : Cone F isLimit : IsLimit cone #align category_theory.limits.limit_cone CategoryTheory.Limits.LimitCone #align category_theory.limits.limit_cone.is_limit CategoryTheory.Limits.LimitCone.isLimit class HasLimit (F : J ⥤ C) : Prop where mk' :: exists_limit : Nonempty (LimitCone F) #align category_theory.limits.has_limit CategoryTheory.Limits.HasLimit theorem HasLimit.mk {F : J ⥤ C} (d : LimitCone F) : HasLimit F := ⟨Nonempty.intro d⟩ #align category_theory.limits.has_limit.mk CategoryTheory.Limits.HasLimit.mk def getLimitCone (F : J ⥤ C) [HasLimit F] : LimitCone F := Classical.choice <\| HasLimit.exists_limit #align category_theory.limits.get_limit_cone CategoryTheory.Limits.getLimitCone variable (J C) class HasLimitsOfShape : Prop where has_limit : ∀ F : J ⥤ C, HasLimit F := by infer_instance #align category_theory.limits.has_limits_of_shape CategoryTheory.Limits.HasLimitsOfShape @[pp_with_univ] class HasLimitsOfSize (C : Type u) [Category.{v} C] : Prop where has_limits_of_shape : ∀ (J : Type u₁) [Category.{v₁} J], HasLimitsOfShape J C := by infer_instance #align category_theory.limits.has_limits_of_size CategoryTheory.Limits.HasLimitsOfSize abbrev HasLimits (C : Type u) [Category.{v} C] : Prop := HasLimitsOfSize.{v, v} C #align category_theory.limits.has_limits CategoryTheory.Limits.HasLimits theorem HasLimits.has_limits_of_shape {C : Type u} [Category.{v} C] [HasLimits C] (J : Type v) [Category.{v} J] : HasLimitsOfShape J C := HasLimitsOfSize.has_limits_of_shape J #align category_theory.limits.has_limits.has_limits_of_shape CategoryTheory.Limits.HasLimits.has_limits_of_shape variable {J C} -- see Note [lower instance priority] instance (priority := 100) hasLimitOfHasLimitsOfShape {J : Type u₁} [Category.{v₁} J] [HasLimitsOfShape J C] (F : J ⥤ C) : HasLimit F := HasLimitsOfShape.has_limit F #align category_theory.limits.has_limit_of_has_limits_of_shape CategoryTheory.Limits.hasLimitOfHasLimitsOfShape -- see Note [lower instance priority] instance (priority := 100) hasLimitsOfShapeOfHasLimits {J : Type u₁} [Category.{v₁} J] [HasLimitsOfSize.{v₁, u₁} C] : HasLimitsOfShape J C := HasLimitsOfSize.has_limits_of_shape J #align category_theory.limits.has_limits_of_shape_of_has_limits CategoryTheory.Limits.hasLimitsOfShapeOfHasLimits -- Interface to the `HasLimit` class. def limit.cone (F : J ⥤ C) [HasLimit F] : Cone F := (getLimitCone F).cone #align category_theory.limits.limit.cone CategoryTheory.Limits.limit.cone def limit (F : J ⥤ C) [HasLimit F] := (limit.cone F).pt #align category_theory.limits.limit CategoryTheory.Limits.limit def limit.π (F : J ⥤ C) [HasLimit F] (j : J) : limit F ⟶ F.obj j := (limit.cone F).π.app j #align category_theory.limits.limit.π CategoryTheory.Limits.limit.π @[simp] theorem limit.cone_x {F : J ⥤ C} [HasLimit F] : (limit.cone F).pt = limit F := rfl set_option linter.uppercaseLean3 false in #align category_theory.limits.limit.cone_X CategoryTheory.Limits.limit.cone_x @[simp] theorem limit.cone_π {F : J ⥤ C} [HasLimit F] : (limit.cone F).π.app = limit.π _ := rfl #align category_theory.limits.limit.cone_π CategoryTheory.Limits.limit.cone_π @[reassoc (attr := simp)] theorem limit.w (F : J ⥤ C) [HasLimit F] {j j' : J} (f : j ⟶ j') : limit.π F j ≫ F.map f = limit.π F j' := (limit.cone F).w f #align category_theory.limits.limit.w CategoryTheory.Limits.limit.w def limit.isLimit (F : J ⥤ C) [HasLimit F] : IsLimit (limit.cone F) := (getLimitCone F).isLimit #align category_theory.limits.limit.is_limit CategoryTheory.Limits.limit.isLimit def limit.lift (F : J ⥤ C) [HasLimit F] (c : Cone F) : c.pt ⟶ limit F := (limit.isLimit F).lift c #align category_theory.limits.limit.lift CategoryTheory.Limits.limit.lift @[simp] theorem limit.isLimit_lift {F : J ⥤ C} [HasLimit F] (c : Cone F) : (limit.isLimit F).lift c = limit.lift F c := rfl #align category_theory.limits.limit.is_limit_lift CategoryTheory.Limits.limit.isLimit_lift @[reassoc (attr := simp)] theorem limit.lift_π {F : J ⥤ C} [HasLimit F] (c : Cone F) (j : J) : limit.lift F c ≫ limit.π F j = c.π.app j := IsLimit.fac _ c j #align category_theory.limits.limit.lift_π CategoryTheory.Limits.limit.lift_π def limMap {F G : J ⥤ C} [HasLimit F] [HasLimit G] (α : F ⟶ G) : limit F ⟶ limit G := IsLimit.map _ (limit.isLimit G) α #align category_theory.limits.lim_map CategoryTheory.Limits.limMap @[reassoc (attr := simp)] theorem limMap_π {F G : J ⥤ C} [HasLimit F] [HasLimit G] (α : F ⟶ G) (j : J) : limMap α ≫ limit.π G j = limit.π F j ≫ α.app j := limit.lift_π _ j #align category_theory.limits.lim_map_π CategoryTheory.Limits.limMap_π def limit.coneMorphism {F : J ⥤ C} [HasLimit F] (c : Cone F) : c ⟶ limit.cone F := (limit.isLimit F).liftConeMorphism c #align category_theory.limits.limit.cone_morphism CategoryTheory.Limits.limit.coneMorphism @[simp] theorem limit.coneMorphism_hom {F : J ⥤ C} [HasLimit F] (c : Cone F) : (limit.coneMorphism c).hom = limit.lift F c := rfl #align category_theory.limits.limit.cone_morphism_hom CategoryTheory.Limits.limit.coneMorphism_hom theorem limit.coneMorphism_π {F : J ⥤ C} [HasLimit F] (c : Cone F) (j : J) : (limit.coneMorphism c).hom ≫ limit.π F j = c.π.app j := by simp #align category_theory.limits.limit.cone_morphism_π CategoryTheory.Limits.limit.coneMorphism_π @[reassoc (attr := simp)] theorem limit.conePointUniqueUpToIso_hom_comp {F : J ⥤ C} [HasLimit F] {c : Cone F} (hc : IsLimit c) (j : J) : (IsLimit.conePointUniqueUpToIso hc (limit.isLimit _)).hom ≫ limit.π F j = c.π.app j := IsLimit.conePointUniqueUpToIso_hom_comp _ _ _ #align category_theory.limits.limit.cone_point_unique_up_to_iso_hom_comp CategoryTheory.Limits.limit.conePointUniqueUpToIso_hom_comp @[reassoc (attr := simp)] theorem limit.conePointUniqueUpToIso_inv_comp {F : J ⥤ C} [HasLimit F] {c : Cone F} (hc : IsLimit c) (j : J) : (IsLimit.conePointUniqueUpToIso (limit.isLimit _) hc).inv ≫ limit.π F j = c.π.app j := IsLimit.conePointUniqueUpToIso_inv_comp _ _ _ #align category_theory.limits.limit.cone_point_unique_up_to_iso_inv_comp CategoryTheory.Limits.limit.conePointUniqueUpToIso_inv_comp theorem limit.existsUnique {F : J ⥤ C} [HasLimit F] (t : Cone F) : ∃! l : t.pt ⟶ limit F, ∀ j, l ≫ limit.π F j = t.π.app j := (limit.isLimit F).existsUnique _ #align category_theory.limits.limit.exists_unique CategoryTheory.Limits.limit.existsUnique def limit.isoLimitCone {F : J ⥤ C} [HasLimit F] (t : LimitCone F) : limit F ≅ t.cone.pt := IsLimit.conePointUniqueUpToIso (limit.isLimit F) t.isLimit #align category_theory.limits.limit.iso_limit_cone CategoryTheory.Limits.limit.isoLimitCone @[reassoc (attr := simp)] theorem limit.isoLimitCone_hom_π {F : J ⥤ C} [HasLimit F] (t : LimitCone F) (j : J) : (limit.isoLimitCone t).hom ≫ t.cone.π.app j = limit.π F j := by dsimp [limit.isoLimitCone, IsLimit.conePointUniqueUpToIso] aesop_cat #align category_theory.limits.limit.iso_limit_cone_hom_π CategoryTheory.Limits.limit.isoLimitCone_hom_π @[reassoc (attr := simp)] theorem limit.isoLimitCone_inv_π {F : J ⥤ C} [HasLimit F] (t : LimitCone F) (j : J) : (limit.isoLimitCone t).inv ≫ limit.π F j = t.cone.π.app j := by dsimp [limit.isoLimitCone, IsLimit.conePointUniqueUpToIso] aesop_cat #align category_theory.limits.limit.iso_limit_cone_inv_π CategoryTheory.Limits.limit.isoLimitCone_inv_π @[ext] theorem limit.hom_ext {F : J ⥤ C} [HasLimit F] {X : C} {f f' : X ⟶ limit F} (w : ∀ j, f ≫ limit.π F j = f' ≫ limit.π F j) : f = f' := (limit.isLimit F).hom_ext w #align category_theory.limits.limit.hom_ext CategoryTheory.Limits.limit.hom_ext @[simp] theorem limit.lift_map {F G : J ⥤ C} [HasLimit F] [HasLimit G] (c : Cone F) (α : F ⟶ G) : limit.lift F c ≫ limMap α = limit.lift G ((Cones.postcompose α).obj c) := by ext rw [assoc, limMap_π, limit.lift_π_assoc, limit.lift_π] rfl #align category_theory.limits.limit.lift_map CategoryTheory.Limits.limit.lift_map @[simp] theorem limit.lift_cone {F : J ⥤ C} [HasLimit F] : limit.lift F (limit.cone F) = 𝟙 (limit F) := (limit.isLimit _).lift_self #align category_theory.limits.limit.lift_cone CategoryTheory.Limits.limit.lift_cone def limit.homIso (F : J ⥤ C) [HasLimit F] (W : C) : ULift.{u₁} (W ⟶ limit F : Type v) ≅ F.cones.obj (op W) := (limit.isLimit F).homIso W #align category_theory.limits.limit.hom_iso CategoryTheory.Limits.limit.homIso @[simp] theorem limit.homIso_hom (F : J ⥤ C) [HasLimit F] {W : C} (f : ULift (W ⟶ limit F)) : (limit.homIso F W).hom f = (const J).map f.down ≫ (limit.cone F).π := (limit.isLimit F).homIso_hom f #align category_theory.limits.limit.hom_iso_hom CategoryTheory.Limits.limit.homIso_hom def limit.homIso' (F : J ⥤ C) [HasLimit F] (W : C) : ULift.{u₁} (W ⟶ limit F : Type v) ≅ { p : ∀ j, W ⟶ F.obj j // ∀ {j j' : J} (f : j ⟶ j'), p j ≫ F.map f = p j' } := (limit.isLimit F).homIso' W #align category_theory.limits.limit.hom_iso' CategoryTheory.Limits.limit.homIso' theorem limit.lift_extend {F : J ⥤ C} [HasLimit F] (c : Cone F) {X : C} (f : X ⟶ c.pt) : limit.lift F (c.extend f) = f ≫ limit.lift F c := by aesop_cat #align category_theory.limits.limit.lift_extend CategoryTheory.Limits.limit.lift_extend theorem hasLimitOfIso {F G : J ⥤ C} [HasLimit F] (α : F ≅ G) : HasLimit G := HasLimit.mk { cone := (Cones.postcompose α.hom).obj (limit.cone F) isLimit := (IsLimit.postcomposeHomEquiv _ _).symm (limit.isLimit F) } #align category_theory.limits.has_limit_of_iso CategoryTheory.Limits.hasLimitOfIso -- See the construction of limits from products and equalizers -- for an example usage. theorem HasLimit.ofConesIso {J K : Type u₁} [Category.{v₁} J] [Category.{v₂} K] (F : J ⥤ C) (G : K ⥤ C) (h : F.cones ≅ G.cones) [HasLimit F] : HasLimit G := HasLimit.mk ⟨_, IsLimit.ofNatIso (IsLimit.natIso (limit.isLimit F) ≪≫ h)⟩ #align category_theory.limits.has_limit.of_cones_iso CategoryTheory.Limits.HasLimit.ofConesIso def HasLimit.isoOfNatIso {F G : J ⥤ C} [HasLimit F] [HasLimit G] (w : F ≅ G) : limit F ≅ limit G := IsLimit.conePointsIsoOfNatIso (limit.isLimit F) (limit.isLimit G) w #align category_theory.limits.has_limit.iso_of_nat_iso CategoryTheory.Limits.HasLimit.isoOfNatIso @[reassoc (attr := simp)] theorem HasLimit.isoOfNatIso_hom_π {F G : J ⥤ C} [HasLimit F] [HasLimit G] (w : F ≅ G) (j : J) : (HasLimit.isoOfNatIso w).hom ≫ limit.π G j = limit.π F j ≫ w.hom.app j := IsLimit.conePointsIsoOfNatIso_hom_comp _ _ _ _ #align category_theory.limits.has_limit.iso_of_nat_iso_hom_π CategoryTheory.Limits.HasLimit.isoOfNatIso_hom_π @[reassoc (attr := simp)] theorem HasLimit.isoOfNatIso_inv_π {F G : J ⥤ C} [HasLimit F] [HasLimit G] (w : F ≅ G) (j : J) : (HasLimit.isoOfNatIso w).inv ≫ limit.π F j = limit.π G j ≫ w.inv.app j := IsLimit.conePointsIsoOfNatIso_inv_comp _ _ _ _ #align category_theory.limits.has_limit.iso_of_nat_iso_inv_π CategoryTheory.Limits.HasLimit.isoOfNatIso_inv_π @[reassoc (attr := simp)] theorem HasLimit.lift_isoOfNatIso_hom {F G : J ⥤ C} [HasLimit F] [HasLimit G] (t : Cone F) (w : F ≅ G) : limit.lift F t ≫ (HasLimit.isoOfNatIso w).hom = limit.lift G ((Cones.postcompose w.hom).obj _) := IsLimit.lift_comp_conePointsIsoOfNatIso_hom _ _ _ #align category_theory.limits.has_limit.lift_iso_of_nat_iso_hom CategoryTheory.Limits.HasLimit.lift_isoOfNatIso_hom @[reassoc (attr := simp)] theorem HasLimit.lift_isoOfNatIso_inv {F G : J ⥤ C} [HasLimit F] [HasLimit G] (t : Cone G) (w : F ≅ G) : limit.lift G t ≫ (HasLimit.isoOfNatIso w).inv = limit.lift F ((Cones.postcompose w.inv).obj _) := IsLimit.lift_comp_conePointsIsoOfNatIso_inv _ _ _ #align category_theory.limits.has_limit.lift_iso_of_nat_iso_inv CategoryTheory.Limits.HasLimit.lift_isoOfNatIso_inv def HasLimit.isoOfEquivalence {F : J ⥤ C} [HasLimit F] {G : K ⥤ C} [HasLimit G] (e : J ≌ K) (w : e.functor ⋙ G ≅ F) : limit F ≅ limit G := IsLimit.conePointsIsoOfEquivalence (limit.isLimit F) (limit.isLimit G) e w #align category_theory.limits.has_limit.iso_of_equivalence CategoryTheory.Limits.HasLimit.isoOfEquivalence @[simp] theorem HasLimit.isoOfEquivalence_hom_π {F : J ⥤ C} [HasLimit F] {G : K ⥤ C} [HasLimit G] (e : J ≌ K) (w : e.functor ⋙ G ≅ F) (k : K) : (HasLimit.isoOfEquivalence e w).hom ≫ limit.π G k = limit.π F (e.inverse.obj k) ≫ w.inv.app (e.inverse.obj k) ≫ G.map (e.counit.app k) := by simp only [HasLimit.isoOfEquivalence, IsLimit.conePointsIsoOfEquivalence_hom] dsimp simp #align category_theory.limits.has_limit.iso_of_equivalence_hom_π CategoryTheory.Limits.HasLimit.isoOfEquivalence_hom_π @[simp] theorem HasLimit.isoOfEquivalence_inv_π {F : J ⥤ C} [HasLimit F] {G : K ⥤ C} [HasLimit G] (e : J ≌ K) (w : e.functor ⋙ G ≅ F) (j : J) : (HasLimit.isoOfEquivalence e w).inv ≫ limit.π F j = limit.π G (e.functor.obj j) ≫ w.hom.app j := by simp only [HasLimit.isoOfEquivalence, IsLimit.conePointsIsoOfEquivalence_hom] dsimp simp #align category_theory.limits.has_limit.iso_of_equivalence_inv_π CategoryTheory.Limits.HasLimit.isoOfEquivalence_inv_π theorem limit.pre_post {D : Type u'} [Category.{v'} D] (E : K ⥤ J) (F : J ⥤ C) (G : C ⥤ D) [HasLimit F] [HasLimit (E ⋙ F)] [HasLimit (F ⋙ G)] [h : HasLimit ((E ⋙ F) ⋙ G)] :-- G (limit F) ⟶ G (limit (E ⋙ F)) ⟶ limit ((E ⋙ F) ⋙ G) vs -- G (limit F) ⟶ limit F ⋙ G ⟶ limit (E ⋙ (F ⋙ G)) or haveI : HasLimit (E ⋙ F ⋙ G) := h G.map (limit.pre F E) ≫ limit.post (E ⋙ F) G = limit.post F G ≫ limit.pre (F ⋙ G) E := by haveI : HasLimit (E ⋙ F ⋙ G) := h ext; erw [assoc, limit.post_π, ← G.map_comp, limit.pre_π, assoc, limit.pre_π, limit.post_π] #align category_theory.limits.limit.pre_post CategoryTheory.Limits.limit.pre_post open CategoryTheory.Equivalence instance hasLimitEquivalenceComp (e : K ≌ J) [HasLimit F] : HasLimit (e.functor ⋙ F) := HasLimit.mk { cone := Cone.whisker e.functor (limit.cone F) isLimit := IsLimit.whiskerEquivalence (limit.isLimit F) e } #align category_theory.limits.has_limit_equivalence_comp CategoryTheory.Limits.hasLimitEquivalenceComp -- Porting note: testing whether this still needed -- attribute [local elab_without_expected_type] inv_fun_id_assoc -- not entirely sure why this is needed theorem hasLimitOfEquivalenceComp (e : K ≌ J) [HasLimit (e.functor ⋙ F)] : HasLimit F := by haveI : HasLimit (e.inverse ⋙ e.functor ⋙ F) := Limits.hasLimitEquivalenceComp e.symm apply hasLimitOfIso (e.invFunIdAssoc F) #align category_theory.limits.has_limit_of_equivalence_comp CategoryTheory.Limits.hasLimitOfEquivalenceComp -- `hasLimitCompEquivalence` and `hasLimitOfCompEquivalence` -- are proved in `CategoryTheory/Adjunction/Limits.lean`. instance limMap_mono' {F G : J ⥤ C} [HasLimitsOfShape J C] (α : F ⟶ G) [Mono α] : Mono (limMap α) := (lim : (J ⥤ C) ⥤ C).map_mono α #align category_theory.limits.lim_map_mono' CategoryTheory.Limits.limMap_mono' instance limMap_mono {F G : J ⥤ C} [HasLimit F] [HasLimit G] (α : F ⟶ G) [∀ j, Mono (α.app j)] : Mono (limMap α) := ⟨fun {Z} u v h => limit.hom_ext fun j => (cancel_mono (α.app j)).1 <\| by simpa using h =≫ limit.π _ j⟩ #align category_theory.limits.lim_map_mono CategoryTheory.Limits.limMap_mono section Colimit -- @[nolint has_nonempty_instance] -- Porting note(#5171): removed; linter not ported yet structure ColimitCocone (F : J ⥤ C) where cocone : Cocone F isColimit : IsColimit cocone #align category_theory.limits.colimit_cocone CategoryTheory.Limits.ColimitCocone #align category_theory.limits.colimit_cocone.is_colimit CategoryTheory.Limits.ColimitCocone.isColimit class HasColimit (F : J ⥤ C) : Prop where mk' :: exists_colimit : Nonempty (ColimitCocone F) #align category_theory.limits.has_colimit CategoryTheory.Limits.HasColimit theorem HasColimit.mk {F : J ⥤ C} (d : ColimitCocone F) : HasColimit F := ⟨Nonempty.intro d⟩ #align category_theory.limits.has_colimit.mk CategoryTheory.Limits.HasColimit.mk def getColimitCocone (F : J ⥤ C) [HasColimit F] : ColimitCocone F := Classical.choice <\| HasColimit.exists_colimit #align category_theory.limits.get_colimit_cocone CategoryTheory.Limits.getColimitCocone variable (J C) class HasColimitsOfShape : Prop where has_colimit : ∀ F : J ⥤ C, HasColimit F := by infer_instance #align category_theory.limits.has_colimits_of_shape CategoryTheory.Limits.HasColimitsOfShape @[pp_with_univ] class HasColimitsOfSize (C : Type u) [Category.{v} C] : Prop where has_colimits_of_shape : ∀ (J : Type u₁) [Category.{v₁} J], HasColimitsOfShape J C := by infer_instance #align category_theory.limits.has_colimits_of_size CategoryTheory.Limits.HasColimitsOfSize abbrev HasColimits (C : Type u) [Category.{v} C] : Prop := HasColimitsOfSize.{v, v} C #align category_theory.limits.has_colimits CategoryTheory.Limits.HasColimits theorem HasColimits.hasColimitsOfShape {C : Type u} [Category.{v} C] [HasColimits C] (J : Type v) [Category.{v} J] : HasColimitsOfShape J C := HasColimitsOfSize.has_colimits_of_shape J #align category_theory.limits.has_colimits.has_colimits_of_shape CategoryTheory.Limits.HasColimits.hasColimitsOfShape variable {J C} -- see Note [lower instance priority] instance (priority := 100) hasColimitOfHasColimitsOfShape {J : Type u₁} [Category.{v₁} J] [HasColimitsOfShape J C] (F : J ⥤ C) : HasColimit F := HasColimitsOfShape.has_colimit F #align category_theory.limits.has_colimit_of_has_colimits_of_shape CategoryTheory.Limits.hasColimitOfHasColimitsOfShape -- see Note [lower instance priority] instance (priority := 100) hasColimitsOfShapeOfHasColimitsOfSize {J : Type u₁} [Category.{v₁} J] [HasColimitsOfSize.{v₁, u₁} C] : HasColimitsOfShape J C := HasColimitsOfSize.has_colimits_of_shape J #align category_theory.limits.has_colimits_of_shape_of_has_colimits_of_size CategoryTheory.Limits.hasColimitsOfShapeOfHasColimitsOfSize -- Interface to the `HasColimit` class. def colimit.cocone (F : J ⥤ C) [HasColimit F] : Cocone F := (getColimitCocone F).cocone #align category_theory.limits.colimit.cocone CategoryTheory.Limits.colimit.cocone def colimit (F : J ⥤ C) [HasColimit F] := (colimit.cocone F).pt #align category_theory.limits.colimit CategoryTheory.Limits.colimit def colimit.ι (F : J ⥤ C) [HasColimit F] (j : J) : F.obj j ⟶ colimit F := (colimit.cocone F).ι.app j #align category_theory.limits.colimit.ι CategoryTheory.Limits.colimit.ι @[simp] theorem colimit.cocone_ι {F : J ⥤ C} [HasColimit F] (j : J) : (colimit.cocone F).ι.app j = colimit.ι _ j := rfl #align category_theory.limits.colimit.cocone_ι CategoryTheory.Limits.colimit.cocone_ι @[simp] theorem colimit.cocone_x {F : J ⥤ C} [HasColimit F] : (colimit.cocone F).pt = colimit F := rfl set_option linter.uppercaseLean3 false in #align category_theory.limits.colimit.cocone_X CategoryTheory.Limits.colimit.cocone_x @[reassoc (attr := simp)] theorem colimit.w (F : J ⥤ C) [HasColimit F] {j j' : J} (f : j ⟶ j') : F.map f ≫ colimit.ι F j' = colimit.ι F j := (colimit.cocone F).w f #align category_theory.limits.colimit.w CategoryTheory.Limits.colimit.w def colimit.isColimit (F : J ⥤ C) [HasColimit F] : IsColimit (colimit.cocone F) := (getColimitCocone F).isColimit #align category_theory.limits.colimit.is_colimit CategoryTheory.Limits.colimit.isColimit def colimit.desc (F : J ⥤ C) [HasColimit F] (c : Cocone F) : colimit F ⟶ c.pt := (colimit.isColimit F).desc c #align category_theory.limits.colimit.desc CategoryTheory.Limits.colimit.desc @[simp] theorem colimit.isColimit_desc {F : J ⥤ C} [HasColimit F] (c : Cocone F) : (colimit.isColimit F).desc c = colimit.desc F c := rfl #align category_theory.limits.colimit.is_colimit_desc CategoryTheory.Limits.colimit.isColimit_desc @[reassoc (attr := simp)] theorem colimit.ι_desc {F : J ⥤ C} [HasColimit F] (c : Cocone F) (j : J) : colimit.ι F j ≫ colimit.desc F c = c.ι.app j := IsColimit.fac _ c j #align category_theory.limits.colimit.ι_desc CategoryTheory.Limits.colimit.ι_desc def colimMap {F G : J ⥤ C} [HasColimit F] [HasColimit G] (α : F ⟶ G) : colimit F ⟶ colimit G := IsColimit.map (colimit.isColimit F) _ α #align category_theory.limits.colim_map CategoryTheory.Limits.colimMap @[reassoc (attr := simp)] theorem ι_colimMap {F G : J ⥤ C} [HasColimit F] [HasColimit G] (α : F ⟶ G) (j : J) : colimit.ι F j ≫ colimMap α = α.app j ≫ colimit.ι G j := colimit.ι_desc _ j #align category_theory.limits.ι_colim_map CategoryTheory.Limits.ι_colimMap def colimit.coconeMorphism {F : J ⥤ C} [HasColimit F] (c : Cocone F) : colimit.cocone F ⟶ c := (colimit.isColimit F).descCoconeMorphism c #align category_theory.limits.colimit.cocone_morphism CategoryTheory.Limits.colimit.coconeMorphism @[simp] theorem colimit.coconeMorphism_hom {F : J ⥤ C} [HasColimit F] (c : Cocone F) : (colimit.coconeMorphism c).hom = colimit.desc F c := rfl #align category_theory.limits.colimit.cocone_morphism_hom CategoryTheory.Limits.colimit.coconeMorphism_hom theorem colimit.ι_coconeMorphism {F : J ⥤ C} [HasColimit F] (c : Cocone F) (j : J) : colimit.ι F j ≫ (colimit.coconeMorphism c).hom = c.ι.app j := by simp #align category_theory.limits.colimit.ι_cocone_morphism CategoryTheory.Limits.colimit.ι_coconeMorphism @[reassoc (attr := simp)] theorem colimit.comp_coconePointUniqueUpToIso_hom {F : J ⥤ C} [HasColimit F] {c : Cocone F} (hc : IsColimit c) (j : J) : colimit.ι F j ≫ (IsColimit.coconePointUniqueUpToIso (colimit.isColimit _) hc).hom = c.ι.app j := IsColimit.comp_coconePointUniqueUpToIso_hom _ _ _ #align category_theory.limits.colimit.comp_cocone_point_unique_up_to_iso_hom CategoryTheory.Limits.colimit.comp_coconePointUniqueUpToIso_hom @[reassoc (attr := simp)] theorem colimit.comp_coconePointUniqueUpToIso_inv {F : J ⥤ C} [HasColimit F] {c : Cocone F} (hc : IsColimit c) (j : J) : colimit.ι F j ≫ (IsColimit.coconePointUniqueUpToIso hc (colimit.isColimit _)).inv = c.ι.app j := IsColimit.comp_coconePointUniqueUpToIso_inv _ _ _ #align category_theory.limits.colimit.comp_cocone_point_unique_up_to_iso_inv CategoryTheory.Limits.colimit.comp_coconePointUniqueUpToIso_inv theorem colimit.existsUnique {F : J ⥤ C} [HasColimit F] (t : Cocone F) : ∃! d : colimit F ⟶ t.pt, ∀ j, colimit.ι F j ≫ d = t.ι.app j := (colimit.isColimit F).existsUnique _ #align category_theory.limits.colimit.exists_unique CategoryTheory.Limits.colimit.existsUnique def colimit.isoColimitCocone {F : J ⥤ C} [HasColimit F] (t : ColimitCocone F) : colimit F ≅ t.cocone.pt := IsColimit.coconePointUniqueUpToIso (colimit.isColimit F) t.isColimit #align category_theory.limits.colimit.iso_colimit_cocone CategoryTheory.Limits.colimit.isoColimitCocone @[reassoc (attr := simp)] theorem colimit.isoColimitCocone_ι_hom {F : J ⥤ C} [HasColimit F] (t : ColimitCocone F) (j : J) : colimit.ι F j ≫ (colimit.isoColimitCocone t).hom = t.cocone.ι.app j := by dsimp [colimit.isoColimitCocone, IsColimit.coconePointUniqueUpToIso] aesop_cat #align category_theory.limits.colimit.iso_colimit_cocone_ι_hom CategoryTheory.Limits.colimit.isoColimitCocone_ι_hom @[reassoc (attr := simp)] theorem colimit.isoColimitCocone_ι_inv {F : J ⥤ C} [HasColimit F] (t : ColimitCocone F) (j : J) : t.cocone.ι.app j ≫ (colimit.isoColimitCocone t).inv = colimit.ι F j := by dsimp [colimit.isoColimitCocone, IsColimit.coconePointUniqueUpToIso] aesop_cat #align category_theory.limits.colimit.iso_colimit_cocone_ι_inv CategoryTheory.Limits.colimit.isoColimitCocone_ι_inv @[ext] theorem colimit.hom_ext {F : J ⥤ C} [HasColimit F] {X : C} {f f' : colimit F ⟶ X} (w : ∀ j, colimit.ι F j ≫ f = colimit.ι F j ≫ f') : f = f' := (colimit.isColimit F).hom_ext w #align category_theory.limits.colimit.hom_ext CategoryTheory.Limits.colimit.hom_ext @[simp] theorem colimit.desc_cocone {F : J ⥤ C} [HasColimit F] : colimit.desc F (colimit.cocone F) = 𝟙 (colimit F) := (colimit.isColimit _).desc_self #align category_theory.limits.colimit.desc_cocone CategoryTheory.Limits.colimit.desc_cocone def colimit.homIso (F : J ⥤ C) [HasColimit F] (W : C) : ULift.{u₁} (colimit F ⟶ W : Type v) ≅ F.cocones.obj W := (colimit.isColimit F).homIso W #align category_theory.limits.colimit.hom_iso CategoryTheory.Limits.colimit.homIso @[simp] theorem colimit.homIso_hom (F : J ⥤ C) [HasColimit F] {W : C} (f : ULift (colimit F ⟶ W)) : (colimit.homIso F W).hom f = (colimit.cocone F).ι ≫ (const J).map f.down := (colimit.isColimit F).homIso_hom f #align category_theory.limits.colimit.hom_iso_hom CategoryTheory.Limits.colimit.homIso_hom def colimit.homIso' (F : J ⥤ C) [HasColimit F] (W : C) : ULift.{u₁} (colimit F ⟶ W : Type v) ≅ { p : ∀ j, F.obj j ⟶ W // ∀ {j j'} (f : j ⟶ j'), F.map f ≫ p j' = p j } := (colimit.isColimit F).homIso' W #align category_theory.limits.colimit.hom_iso' CategoryTheory.Limits.colimit.homIso' theorem colimit.desc_extend (F : J ⥤ C) [HasColimit F] (c : Cocone F) {X : C} (f : c.pt ⟶ X) : colimit.desc F (c.extend f) = colimit.desc F c ≫ f := by ext1; rw [← Category.assoc]; simp #align category_theory.limits.colimit.desc_extend CategoryTheory.Limits.colimit.desc_extend -- This has the isomorphism pointing in the opposite direction than in `has_limit_of_iso`. -- This is intentional; it seems to help with elaboration. theorem hasColimitOfIso {F G : J ⥤ C} [HasColimit F] (α : G ≅ F) : HasColimit G := HasColimit.mk { cocone := (Cocones.precompose α.hom).obj (colimit.cocone F) isColimit := (IsColimit.precomposeHomEquiv _ _).symm (colimit.isColimit F) } #align category_theory.limits.has_colimit_of_iso CategoryTheory.Limits.hasColimitOfIso theorem HasColimit.ofCoconesIso {K : Type u₁} [Category.{v₂} K] (F : J ⥤ C) (G : K ⥤ C) (h : F.cocones ≅ G.cocones) [HasColimit F] : HasColimit G := HasColimit.mk ⟨_, IsColimit.ofNatIso (IsColimit.natIso (colimit.isColimit F) ≪≫ h)⟩ #align category_theory.limits.has_colimit.of_cocones_iso CategoryTheory.Limits.HasColimit.ofCoconesIso def HasColimit.isoOfNatIso {F G : J ⥤ C} [HasColimit F] [HasColimit G] (w : F ≅ G) : colimit F ≅ colimit G := IsColimit.coconePointsIsoOfNatIso (colimit.isColimit F) (colimit.isColimit G) w #align category_theory.limits.has_colimit.iso_of_nat_iso CategoryTheory.Limits.HasColimit.isoOfNatIso @[reassoc (attr := simp)] theorem HasColimit.isoOfNatIso_ι_hom {F G : J ⥤ C} [HasColimit F] [HasColimit G] (w : F ≅ G) (j : J) : colimit.ι F j ≫ (HasColimit.isoOfNatIso w).hom = w.hom.app j ≫ colimit.ι G j := IsColimit.comp_coconePointsIsoOfNatIso_hom _ _ _ _ #align category_theory.limits.has_colimit.iso_of_nat_iso_ι_hom CategoryTheory.Limits.HasColimit.isoOfNatIso_ι_hom @[reassoc (attr := simp)] theorem HasColimit.isoOfNatIso_ι_inv {F G : J ⥤ C} [HasColimit F] [HasColimit G] (w : F ≅ G) (j : J) : colimit.ι G j ≫ (HasColimit.isoOfNatIso w).inv = w.inv.app j ≫ colimit.ι F j := IsColimit.comp_coconePointsIsoOfNatIso_inv _ _ _ _ #align category_theory.limits.has_colimit.iso_of_nat_iso_ι_inv CategoryTheory.Limits.HasColimit.isoOfNatIso_ι_inv @[reassoc (attr := simp)] theorem HasColimit.isoOfNatIso_hom_desc {F G : J ⥤ C} [HasColimit F] [HasColimit G] (t : Cocone G) (w : F ≅ G) : (HasColimit.isoOfNatIso w).hom ≫ colimit.desc G t = colimit.desc F ((Cocones.precompose w.hom).obj _) := IsColimit.coconePointsIsoOfNatIso_hom_desc _ _ _ #align category_theory.limits.has_colimit.iso_of_nat_iso_hom_desc CategoryTheory.Limits.HasColimit.isoOfNatIso_hom_desc @[reassoc (attr := simp)] theorem HasColimit.isoOfNatIso_inv_desc {F G : J ⥤ C} [HasColimit F] [HasColimit G] (t : Cocone F) (w : F ≅ G) : (HasColimit.isoOfNatIso w).inv ≫ colimit.desc F t = colimit.desc G ((Cocones.precompose w.inv).obj _) := IsColimit.coconePointsIsoOfNatIso_inv_desc _ _ _ #align category_theory.limits.has_colimit.iso_of_nat_iso_inv_desc CategoryTheory.Limits.HasColimit.isoOfNatIso_inv_desc def HasColimit.isoOfEquivalence {F : J ⥤ C} [HasColimit F] {G : K ⥤ C} [HasColimit G] (e : J ≌ K) (w : e.functor ⋙ G ≅ F) : colimit F ≅ colimit G := IsColimit.coconePointsIsoOfEquivalence (colimit.isColimit F) (colimit.isColimit G) e w #align category_theory.limits.has_colimit.iso_of_equivalence CategoryTheory.Limits.HasColimit.isoOfEquivalence @[simp] theorem HasColimit.isoOfEquivalence_hom_π {F : J ⥤ C} [HasColimit F] {G : K ⥤ C} [HasColimit G] (e : J ≌ K) (w : e.functor ⋙ G ≅ F) (j : J) : colimit.ι F j ≫ (HasColimit.isoOfEquivalence e w).hom = F.map (e.unit.app j) ≫ w.inv.app _ ≫ colimit.ι G _ := by simp [HasColimit.isoOfEquivalence, IsColimit.coconePointsIsoOfEquivalence_inv] #align category_theory.limits.has_colimit.iso_of_equivalence_hom_π CategoryTheory.Limits.HasColimit.isoOfEquivalence_hom_π @[simp]	Mathlib/CategoryTheory/Limits/HasLimits.lean	976	980	theorem HasColimit.isoOfEquivalence_inv_π {F : J ⥤ C} [HasColimit F] {G : K ⥤ C} [HasColimit G] (e : J ≌ K) (w : e.functor ⋙ G ≅ F) (k : K) : colimit.ι G k ≫ (HasColimit.isoOfEquivalence e w).inv = G.map (e.counitInv.app k) ≫ w.hom.app (e.inverse.obj k) ≫ colimit.ι F (e.inverse.obj k) := by	simp [HasColimit.isoOfEquivalence, IsColimit.coconePointsIsoOfEquivalence_inv]
import Mathlib.Topology.Order.MonotoneContinuity import Mathlib.Topology.Algebra.Order.LiminfLimsup import Mathlib.Topology.Instances.NNReal import Mathlib.Topology.EMetricSpace.Lipschitz import Mathlib.Topology.Metrizable.Basic import Mathlib.Topology.Order.T5 #align_import topology.instances.ennreal from "leanprover-community/mathlib"@"ec4b2eeb50364487f80421c0b4c41328a611f30d" noncomputable section open Set Filter Metric Function open scoped Classical Topology ENNReal NNReal Filter variable {α : Type} {β : Type} {γ : Type} namespace ENNReal variable {a b c d : ℝ≥0∞} {r p q : ℝ≥0} {x y z : ℝ≥0∞} {ε ε₁ ε₂ : ℝ≥0∞} {s : Set ℝ≥0∞} theorem tsum_comp_le_tsum_of_inj {β : Type} {f : α → ℝ} (hf : Summable f) (hn : ∀ a, 0 ≤ f a) {i : β → α} (hi : Function.Injective i) : tsum (f ∘ i) ≤ tsum f := by lift f to α → ℝ≥0 using hn rw [NNReal.summable_coe] at hf simpa only [(· ∘ ·), ← NNReal.coe_tsum] using NNReal.tsum_comp_le_tsum_of_inj hf hi #align tsum_comp_le_tsum_of_inj tsum_comp_le_tsum_of_inj	Mathlib/Topology/Instances/ENNReal.lean	1,330	1,335	theorem Summable.of_nonneg_of_le {f g : β → ℝ} (hg : ∀ b, 0 ≤ g b) (hgf : ∀ b, g b ≤ f b) (hf : Summable f) : Summable g := by	lift f to β → ℝ≥0 using fun b => (hg b).trans (hgf b) lift g to β → ℝ≥0 using hg rw [NNReal.summable_coe] at hf ⊢ exact NNReal.summable_of_le (fun b => NNReal.coe_le_coe.1 (hgf b)) hf
import Mathlib.Topology.Order.ProjIcc import Mathlib.Topology.ContinuousFunction.Ordered import Mathlib.Topology.CompactOpen import Mathlib.Topology.UnitInterval #align_import topology.homotopy.basic from "leanprover-community/mathlib"@"11c53f174270aa43140c0b26dabce5fc4a253e80" noncomputable section universe u v w x variable {F : Type} {X : Type u} {Y : Type v} {Z : Type w} {Z' : Type x} {ι : Type} variable [TopologicalSpace X] [TopologicalSpace Y] [TopologicalSpace Z] [TopologicalSpace Z'] open unitInterval namespace ContinuousMap structure Homotopy (f₀ f₁ : C(X, Y)) extends C(I × X, Y) where map_zero_left : ∀ x, toFun (0, x) = f₀ x map_one_left : ∀ x, toFun (1, x) = f₁ x #align continuous_map.homotopy ContinuousMap.Homotopy section class HomotopyLike {X Y : outParam Type} [TopologicalSpace X] [TopologicalSpace Y] (F : Type) (f₀ f₁ : outParam <\| C(X, Y)) [FunLike F (I × X) Y] extends ContinuousMapClass F (I × X) Y : Prop where map_zero_left (f : F) : ∀ x, f (0, x) = f₀ x map_one_left (f : F) : ∀ x, f (1, x) = f₁ x #align continuous_map.homotopy_like ContinuousMap.HomotopyLike end namespace Homotopy section variable {f₀ f₁ : C(X, Y)} instance instFunLike : FunLike (Homotopy f₀ f₁) (I × X) Y where coe f := f.toFun coe_injective' f g h := by obtain ⟨⟨_, _⟩, _⟩ := f obtain ⟨⟨_, _⟩, _⟩ := g congr instance : HomotopyLike (Homotopy f₀ f₁) f₀ f₁ where map_continuous f := f.continuous_toFun map_zero_left f := f.map_zero_left map_one_left f := f.map_one_left @[ext] theorem ext {F G : Homotopy f₀ f₁} (h : ∀ x, F x = G x) : F = G := DFunLike.ext _ _ h #align continuous_map.homotopy.ext ContinuousMap.Homotopy.ext def Simps.apply (F : Homotopy f₀ f₁) : I × X → Y := F #align continuous_map.homotopy.simps.apply ContinuousMap.Homotopy.Simps.apply initialize_simps_projections Homotopy (toFun → apply, -toContinuousMap) protected theorem continuous (F : Homotopy f₀ f₁) : Continuous F := F.continuous_toFun #align continuous_map.homotopy.continuous ContinuousMap.Homotopy.continuous @[simp] theorem apply_zero (F : Homotopy f₀ f₁) (x : X) : F (0, x) = f₀ x := F.map_zero_left x #align continuous_map.homotopy.apply_zero ContinuousMap.Homotopy.apply_zero @[simp] theorem apply_one (F : Homotopy f₀ f₁) (x : X) : F (1, x) = f₁ x := F.map_one_left x #align continuous_map.homotopy.apply_one ContinuousMap.Homotopy.apply_one @[simp] theorem coe_toContinuousMap (F : Homotopy f₀ f₁) : ⇑F.toContinuousMap = F := rfl #align continuous_map.homotopy.coe_to_continuous_map ContinuousMap.Homotopy.coe_toContinuousMap def curry (F : Homotopy f₀ f₁) : C(I, C(X, Y)) := F.toContinuousMap.curry #align continuous_map.homotopy.curry ContinuousMap.Homotopy.curry @[simp] theorem curry_apply (F : Homotopy f₀ f₁) (t : I) (x : X) : F.curry t x = F (t, x) := rfl #align continuous_map.homotopy.curry_apply ContinuousMap.Homotopy.curry_apply def extend (F : Homotopy f₀ f₁) : C(ℝ, C(X, Y)) := F.curry.IccExtend zero_le_one #align continuous_map.homotopy.extend ContinuousMap.Homotopy.extend theorem extend_apply_of_le_zero (F : Homotopy f₀ f₁) {t : ℝ} (ht : t ≤ 0) (x : X) : F.extend t x = f₀ x := by rw [← F.apply_zero] exact ContinuousMap.congr_fun (Set.IccExtend_of_le_left (zero_le_one' ℝ) F.curry ht) x #align continuous_map.homotopy.extend_apply_of_le_zero ContinuousMap.Homotopy.extend_apply_of_le_zero	Mathlib/Topology/Homotopy/Basic.lean	172	175	theorem extend_apply_of_one_le (F : Homotopy f₀ f₁) {t : ℝ} (ht : 1 ≤ t) (x : X) : F.extend t x = f₁ x := by	rw [← F.apply_one] exact ContinuousMap.congr_fun (Set.IccExtend_of_right_le (zero_le_one' ℝ) F.curry ht) x
import Mathlib.Algebra.BigOperators.NatAntidiagonal import Mathlib.Topology.Algebra.InfiniteSum.Constructions import Mathlib.Topology.Algebra.Ring.Basic #align_import topology.algebra.infinite_sum.ring from "leanprover-community/mathlib"@"9a59dcb7a2d06bf55da57b9030169219980660cd" open Filter Finset Function open scoped Classical variable {ι κ R α : Type} section NonUnitalNonAssocSemiring variable [NonUnitalNonAssocSemiring α] [TopologicalSpace α] [TopologicalSemiring α] {f g : ι → α} {a a₁ a₂ : α} theorem HasSum.mul_left (a₂) (h : HasSum f a₁) : HasSum (fun i ↦ a₂ f i) (a₂ * a₁) := by simpa only using h.map (AddMonoidHom.mulLeft a₂) (continuous_const.mul continuous_id) #align has_sum.mul_left HasSum.mul_left	Mathlib/Topology/Algebra/InfiniteSum/Ring.lean	38	39	theorem HasSum.mul_right (a₂) (hf : HasSum f a₁) : HasSum (fun i ↦ f i * a₂) (a₁ * a₂) := by	simpa only using hf.map (AddMonoidHom.mulRight a₂) (continuous_id.mul continuous_const)
import Mathlib.CategoryTheory.EqToHom import Mathlib.CategoryTheory.NatIso import Mathlib.CategoryTheory.Products.Basic #align_import category_theory.pi.basic from "leanprover-community/mathlib"@"dc6c365e751e34d100e80fe6e314c3c3e0fd2988" namespace CategoryTheory universe w₀ w₁ w₂ v₁ v₂ v₃ u₁ u₂ u₃ variable {I : Type w₀} {J : Type w₁} (C : I → Type u₁) [∀ i, Category.{v₁} (C i)] instance pi : Category.{max w₀ v₁} (∀ i, C i) where Hom X Y := ∀ i, X i ⟶ Y i id X i := 𝟙 (X i) comp f g i := f i ≫ g i #align category_theory.pi CategoryTheory.pi abbrev pi' {I : Type v₁} (C : I → Type u₁) [∀ i, Category.{v₁} (C i)] : Category.{v₁} (∀ i, C i) := CategoryTheory.pi C #align category_theory.pi' CategoryTheory.pi' attribute [instance] pi' namespace Functor variable {C} variable {D : I → Type u₂} [∀ i, Category.{v₂} (D i)] {A : Type u₃} [Category.{v₃} A] @[simps] def pi (F : ∀ i, C i ⥤ D i) : (∀ i, C i) ⥤ ∀ i, D i where obj f i := (F i).obj (f i) map α i := (F i).map (α i) #align category_theory.functor.pi CategoryTheory.Functor.pi @[simps] def pi' (f : ∀ i, A ⥤ C i) : A ⥤ ∀ i, C i where obj a i := (f i).obj a map h i := (f i).map h #align category_theory.functor.pi' CategoryTheory.Functor.pi' @[simps!] def pi'CompEval {A : Type*} [Category A] (F : ∀ i, A ⥤ C i) (i : I) : pi' F ⋙ Pi.eval C i ≅ F i := Iso.refl _ section EqToHom @[simp]	Mathlib/CategoryTheory/Pi/Basic.lean	226	229	theorem eqToHom_proj {x x' : ∀ i, C i} (h : x = x') (i : I) : (eqToHom h : x ⟶ x') i = eqToHom (Function.funext_iff.mp h i) := by	subst h rfl
import Mathlib.Algebra.CharZero.Lemmas import Mathlib.Algebra.GroupWithZero.Divisibility import Mathlib.Data.Real.Basic import Mathlib.Data.Set.Image #align_import data.complex.basic from "leanprover-community/mathlib"@"31c24aa72e7b3e5ed97a8412470e904f82b81004" open Set Function structure Complex : Type where re : ℝ im : ℝ #align complex Complex @[inherit_doc] notation "ℂ" => Complex namespace Complex open ComplexConjugate noncomputable instance : DecidableEq ℂ := Classical.decEq _ @[simps apply] def equivRealProd : ℂ ≃ ℝ × ℝ where toFun z := ⟨z.re, z.im⟩ invFun p := ⟨p.1, p.2⟩ left_inv := fun ⟨_, _⟩ => rfl right_inv := fun ⟨_, _⟩ => rfl #align complex.equiv_real_prod Complex.equivRealProd @[simp] theorem eta : ∀ z : ℂ, Complex.mk z.re z.im = z \| ⟨_, _⟩ => rfl #align complex.eta Complex.eta -- We only mark this lemma with `ext` locally to avoid it applying whenever terms of `ℂ` appear. theorem ext : ∀ {z w : ℂ}, z.re = w.re → z.im = w.im → z = w \| ⟨_, _⟩, ⟨_, _⟩, rfl, rfl => rfl #align complex.ext Complex.ext attribute [local ext] Complex.ext theorem ext_iff {z w : ℂ} : z = w ↔ z.re = w.re ∧ z.im = w.im := ⟨fun H => by simp [H], fun h => ext h.1 h.2⟩ #align complex.ext_iff Complex.ext_iff theorem re_surjective : Surjective re := fun x => ⟨⟨x, 0⟩, rfl⟩ #align complex.re_surjective Complex.re_surjective theorem im_surjective : Surjective im := fun y => ⟨⟨0, y⟩, rfl⟩ #align complex.im_surjective Complex.im_surjective @[simp] theorem range_re : range re = univ := re_surjective.range_eq #align complex.range_re Complex.range_re @[simp] theorem range_im : range im = univ := im_surjective.range_eq #align complex.range_im Complex.range_im -- Porting note: refactored instance to allow `norm_cast` to work @[coe] def ofReal' (r : ℝ) : ℂ := ⟨r, 0⟩ instance : Coe ℝ ℂ := ⟨ofReal'⟩ @[simp, norm_cast] theorem ofReal_re (r : ℝ) : Complex.re (r : ℂ) = r := rfl #align complex.of_real_re Complex.ofReal_re @[simp, norm_cast] theorem ofReal_im (r : ℝ) : (r : ℂ).im = 0 := rfl #align complex.of_real_im Complex.ofReal_im theorem ofReal_def (r : ℝ) : (r : ℂ) = ⟨r, 0⟩ := rfl #align complex.of_real_def Complex.ofReal_def @[simp, norm_cast] theorem ofReal_inj {z w : ℝ} : (z : ℂ) = w ↔ z = w := ⟨congrArg re, by apply congrArg⟩ #align complex.of_real_inj Complex.ofReal_inj -- Porting note: made coercion explicit theorem ofReal_injective : Function.Injective ((↑) : ℝ → ℂ) := fun _ _ => congrArg re #align complex.of_real_injective Complex.ofReal_injective -- Porting note: made coercion explicit instance canLift : CanLift ℂ ℝ (↑) fun z => z.im = 0 where prf z hz := ⟨z.re, ext rfl hz.symm⟩ #align complex.can_lift Complex.canLift def Set.reProdIm (s t : Set ℝ) : Set ℂ := re ⁻¹' s ∩ im ⁻¹' t #align set.re_prod_im Complex.Set.reProdIm @[inherit_doc] infixl:72 " ×ℂ " => Set.reProdIm theorem mem_reProdIm {z : ℂ} {s t : Set ℝ} : z ∈ s ×ℂ t ↔ z.re ∈ s ∧ z.im ∈ t := Iff.rfl #align complex.mem_re_prod_im Complex.mem_reProdIm instance : Zero ℂ := ⟨(0 : ℝ)⟩ instance : Inhabited ℂ := ⟨0⟩ @[simp] theorem zero_re : (0 : ℂ).re = 0 := rfl #align complex.zero_re Complex.zero_re @[simp] theorem zero_im : (0 : ℂ).im = 0 := rfl #align complex.zero_im Complex.zero_im @[simp, norm_cast] theorem ofReal_zero : ((0 : ℝ) : ℂ) = 0 := rfl #align complex.of_real_zero Complex.ofReal_zero @[simp] theorem ofReal_eq_zero {z : ℝ} : (z : ℂ) = 0 ↔ z = 0 := ofReal_inj #align complex.of_real_eq_zero Complex.ofReal_eq_zero theorem ofReal_ne_zero {z : ℝ} : (z : ℂ) ≠ 0 ↔ z ≠ 0 := not_congr ofReal_eq_zero #align complex.of_real_ne_zero Complex.ofReal_ne_zero instance : One ℂ := ⟨(1 : ℝ)⟩ @[simp] theorem one_re : (1 : ℂ).re = 1 := rfl #align complex.one_re Complex.one_re @[simp] theorem one_im : (1 : ℂ).im = 0 := rfl #align complex.one_im Complex.one_im @[simp, norm_cast] theorem ofReal_one : ((1 : ℝ) : ℂ) = 1 := rfl #align complex.of_real_one Complex.ofReal_one @[simp] theorem ofReal_eq_one {z : ℝ} : (z : ℂ) = 1 ↔ z = 1 := ofReal_inj #align complex.of_real_eq_one Complex.ofReal_eq_one theorem ofReal_ne_one {z : ℝ} : (z : ℂ) ≠ 1 ↔ z ≠ 1 := not_congr ofReal_eq_one #align complex.of_real_ne_one Complex.ofReal_ne_one instance : Add ℂ := ⟨fun z w => ⟨z.re + w.re, z.im + w.im⟩⟩ @[simp] theorem add_re (z w : ℂ) : (z + w).re = z.re + w.re := rfl #align complex.add_re Complex.add_re @[simp] theorem add_im (z w : ℂ) : (z + w).im = z.im + w.im := rfl #align complex.add_im Complex.add_im -- replaced by `re_ofNat` #noalign complex.bit0_re #noalign complex.bit1_re -- replaced by `im_ofNat` #noalign complex.bit0_im #noalign complex.bit1_im @[simp, norm_cast] theorem ofReal_add (r s : ℝ) : ((r + s : ℝ) : ℂ) = r + s := ext_iff.2 <\| by simp [ofReal'] #align complex.of_real_add Complex.ofReal_add -- replaced by `Complex.ofReal_ofNat` #noalign complex.of_real_bit0 #noalign complex.of_real_bit1 instance : Neg ℂ := ⟨fun z => ⟨-z.re, -z.im⟩⟩ @[simp] theorem neg_re (z : ℂ) : (-z).re = -z.re := rfl #align complex.neg_re Complex.neg_re @[simp] theorem neg_im (z : ℂ) : (-z).im = -z.im := rfl #align complex.neg_im Complex.neg_im @[simp, norm_cast] theorem ofReal_neg (r : ℝ) : ((-r : ℝ) : ℂ) = -r := ext_iff.2 <\| by simp [ofReal'] #align complex.of_real_neg Complex.ofReal_neg instance : Sub ℂ := ⟨fun z w => ⟨z.re - w.re, z.im - w.im⟩⟩ instance : Mul ℂ := ⟨fun z w => ⟨z.re * w.re - z.im * w.im, z.re * w.im + z.im * w.re⟩⟩ @[simp] theorem mul_re (z w : ℂ) : (z * w).re = z.re * w.re - z.im * w.im := rfl #align complex.mul_re Complex.mul_re @[simp] theorem mul_im (z w : ℂ) : (z * w).im = z.re * w.im + z.im * w.re := rfl #align complex.mul_im Complex.mul_im @[simp, norm_cast] theorem ofReal_mul (r s : ℝ) : ((r * s : ℝ) : ℂ) = r * s := ext_iff.2 <\| by simp [ofReal'] #align complex.of_real_mul Complex.ofReal_mul theorem re_ofReal_mul (r : ℝ) (z : ℂ) : (r * z).re = r * z.re := by simp [ofReal'] #align complex.of_real_mul_re Complex.re_ofReal_mul	Mathlib/Data/Complex/Basic.lean	262	262	theorem im_ofReal_mul (r : ℝ) (z : ℂ) : (r * z).im = r * z.im := by	simp [ofReal']
import Mathlib.Algebra.QuadraticDiscriminant import Mathlib.Analysis.Convex.SpecificFunctions.Deriv import Mathlib.Analysis.SpecialFunctions.Pow.Complex #align_import analysis.special_functions.trigonometric.complex from "leanprover-community/mathlib"@"8f9fea08977f7e450770933ee6abb20733b47c92" noncomputable section namespace Complex open Set Filter open scoped Real theorem cos_eq_zero_iff {θ : ℂ} : cos θ = 0 ↔ ∃ k : ℤ, θ = (2 * k + 1) * π / 2 := by have h : (exp (θ * I) + exp (-θ * I)) / 2 = 0 ↔ exp (2 * θ * I) = -1 := by rw [@div_eq_iff _ _ (exp (θ * I) + exp (-θ * I)) 2 0 two_ne_zero, zero_mul, add_eq_zero_iff_eq_neg, neg_eq_neg_one_mul, ← div_eq_iff (exp_ne_zero _), ← exp_sub] ring_nf rw [cos, h, ← exp_pi_mul_I, exp_eq_exp_iff_exists_int, mul_right_comm] refine exists_congr fun x => ?_ refine (iff_of_eq <\| congr_arg _ ?_).trans (mul_right_inj' <\| mul_ne_zero two_ne_zero I_ne_zero) field_simp; ring #align complex.cos_eq_zero_iff Complex.cos_eq_zero_iff theorem cos_ne_zero_iff {θ : ℂ} : cos θ ≠ 0 ↔ ∀ k : ℤ, θ ≠ (2 * k + 1) * π / 2 := by rw [← not_exists, not_iff_not, cos_eq_zero_iff] #align complex.cos_ne_zero_iff Complex.cos_ne_zero_iff theorem sin_eq_zero_iff {θ : ℂ} : sin θ = 0 ↔ ∃ k : ℤ, θ = k * π := by rw [← Complex.cos_sub_pi_div_two, cos_eq_zero_iff] constructor · rintro ⟨k, hk⟩ use k + 1 field_simp [eq_add_of_sub_eq hk] ring · rintro ⟨k, rfl⟩ use k - 1 field_simp ring #align complex.sin_eq_zero_iff Complex.sin_eq_zero_iff theorem sin_ne_zero_iff {θ : ℂ} : sin θ ≠ 0 ↔ ∀ k : ℤ, θ ≠ k * π := by rw [← not_exists, not_iff_not, sin_eq_zero_iff] #align complex.sin_ne_zero_iff Complex.sin_ne_zero_iff theorem tan_eq_zero_iff {θ : ℂ} : tan θ = 0 ↔ ∃ k : ℤ, k * π / 2 = θ := by rw [tan, div_eq_zero_iff, ← mul_eq_zero, ← mul_right_inj' two_ne_zero, mul_zero, ← mul_assoc, ← sin_two_mul, sin_eq_zero_iff] field_simp [mul_comm, eq_comm] #align complex.tan_eq_zero_iff Complex.tan_eq_zero_iff theorem tan_ne_zero_iff {θ : ℂ} : tan θ ≠ 0 ↔ ∀ k : ℤ, (k * π / 2 : ℂ) ≠ θ := by rw [← not_exists, not_iff_not, tan_eq_zero_iff] #align complex.tan_ne_zero_iff Complex.tan_ne_zero_iff theorem tan_int_mul_pi_div_two (n : ℤ) : tan (n * π / 2) = 0 := tan_eq_zero_iff.mpr (by use n) #align complex.tan_int_mul_pi_div_two Complex.tan_int_mul_pi_div_two theorem tan_eq_zero_iff' {θ : ℂ} (hθ : cos θ ≠ 0) : tan θ = 0 ↔ ∃ k : ℤ, k * π = θ := by simp only [tan, hθ, div_eq_zero_iff, sin_eq_zero_iff]; simp [eq_comm] theorem cos_eq_cos_iff {x y : ℂ} : cos x = cos y ↔ ∃ k : ℤ, y = 2 * k * π + x ∨ y = 2 * k * π - x := calc cos x = cos y ↔ cos x - cos y = 0 := sub_eq_zero.symm _ ↔ -2 * sin ((x + y) / 2) * sin ((x - y) / 2) = 0 := by rw [cos_sub_cos] _ ↔ sin ((x + y) / 2) = 0 ∨ sin ((x - y) / 2) = 0 := by simp [(by norm_num : (2 : ℂ) ≠ 0)] _ ↔ sin ((x - y) / 2) = 0 ∨ sin ((x + y) / 2) = 0 := or_comm _ ↔ (∃ k : ℤ, y = 2 * k * π + x) ∨ ∃ k : ℤ, y = 2 * k * π - x := by apply or_congr <;> field_simp [sin_eq_zero_iff, (by norm_num : -(2 : ℂ) ≠ 0), eq_sub_iff_add_eq', sub_eq_iff_eq_add, mul_comm (2 : ℂ), mul_right_comm _ (2 : ℂ)] constructor <;> · rintro ⟨k, rfl⟩; use -k; simp _ ↔ ∃ k : ℤ, y = 2 * k * π + x ∨ y = 2 * k * π - x := exists_or.symm #align complex.cos_eq_cos_iff Complex.cos_eq_cos_iff theorem sin_eq_sin_iff {x y : ℂ} : sin x = sin y ↔ ∃ k : ℤ, y = 2 * k * π + x ∨ y = (2 * k + 1) * π - x := by simp only [← Complex.cos_sub_pi_div_two, cos_eq_cos_iff, sub_eq_iff_eq_add] refine exists_congr fun k => or_congr ?_ ?_ <;> refine Eq.congr rfl ?_ <;> field_simp <;> ring #align complex.sin_eq_sin_iff Complex.sin_eq_sin_iff theorem cos_eq_one_iff {x : ℂ} : cos x = 1 ↔ ∃ k : ℤ, k * (2 * π) = x := by rw [← cos_zero, eq_comm, cos_eq_cos_iff] simp [mul_assoc, mul_left_comm, eq_comm]	Mathlib/Analysis/SpecialFunctions/Trigonometric/Complex.lean	114	116	theorem cos_eq_neg_one_iff {x : ℂ} : cos x = -1 ↔ ∃ k : ℤ, π + k * (2 * π) = x := by	rw [← neg_eq_iff_eq_neg, ← cos_sub_pi, cos_eq_one_iff] simp only [eq_sub_iff_add_eq']
import Mathlib.Analysis.InnerProductSpace.Basic import Mathlib.Analysis.NormedSpace.Banach import Mathlib.LinearAlgebra.SesquilinearForm #align_import analysis.inner_product_space.symmetric from "leanprover-community/mathlib"@"3f655f5297b030a87d641ad4e825af8d9679eb0b" open RCLike open ComplexConjugate variable {𝕜 E E' F G : Type*} [RCLike 𝕜] variable [NormedAddCommGroup E] [InnerProductSpace 𝕜 E] variable [NormedAddCommGroup F] [InnerProductSpace 𝕜 F] variable [NormedAddCommGroup G] [InnerProductSpace 𝕜 G] variable [NormedAddCommGroup E'] [InnerProductSpace ℝ E'] local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y namespace LinearMap def IsSymmetric (T : E →ₗ[𝕜] E) : Prop := ∀ x y, ⟪T x, y⟫ = ⟪x, T y⟫ #align linear_map.is_symmetric LinearMap.IsSymmetric theorem IsSymmetric.conj_inner_sym {T : E →ₗ[𝕜] E} (hT : IsSymmetric T) (x y : E) : conj ⟪T x, y⟫ = ⟪T y, x⟫ := by rw [hT x y, inner_conj_symm] #align linear_map.is_symmetric.conj_inner_sym LinearMap.IsSymmetric.conj_inner_sym @[simp] theorem IsSymmetric.apply_clm {T : E →L[𝕜] E} (hT : IsSymmetric (T : E →ₗ[𝕜] E)) (x y : E) : ⟪T x, y⟫ = ⟪x, T y⟫ := hT x y #align linear_map.is_symmetric.apply_clm LinearMap.IsSymmetric.apply_clm theorem isSymmetric_zero : (0 : E →ₗ[𝕜] E).IsSymmetric := fun x y => (inner_zero_right x : ⟪x, 0⟫ = 0).symm ▸ (inner_zero_left y : ⟪0, y⟫ = 0) #align linear_map.is_symmetric_zero LinearMap.isSymmetric_zero theorem isSymmetric_id : (LinearMap.id : E →ₗ[𝕜] E).IsSymmetric := fun _ _ => rfl #align linear_map.is_symmetric_id LinearMap.isSymmetric_id theorem IsSymmetric.add {T S : E →ₗ[𝕜] E} (hT : T.IsSymmetric) (hS : S.IsSymmetric) : (T + S).IsSymmetric := by intro x y rw [LinearMap.add_apply, inner_add_left, hT x y, hS x y, ← inner_add_right] rfl #align linear_map.is_symmetric.add LinearMap.IsSymmetric.add	Mathlib/Analysis/InnerProductSpace/Symmetric.lean	97	110	theorem IsSymmetric.continuous [CompleteSpace E] {T : E →ₗ[𝕜] E} (hT : IsSymmetric T) : Continuous T := by	-- We prove it by using the closed graph theorem refine T.continuous_of_seq_closed_graph fun u x y hu hTu => ?_ rw [← sub_eq_zero, ← @inner_self_eq_zero 𝕜] have hlhs : ∀ k : ℕ, ⟪T (u k) - T x, y - T x⟫ = ⟪u k - x, T (y - T x)⟫ := by intro k rw [← T.map_sub, hT] refine tendsto_nhds_unique ((hTu.sub_const _).inner tendsto_const_nhds) ?_ simp_rw [Function.comp_apply, hlhs] rw [← inner_zero_left (T (y - T x))] refine Filter.Tendsto.inner ?_ tendsto_const_nhds rw [← sub_self x] exact hu.sub_const _
import Mathlib.Data.Matrix.Basic import Mathlib.Data.PEquiv #align_import data.matrix.pequiv from "leanprover-community/mathlib"@"3e068ece210655b7b9a9477c3aff38a492400aa1" namespace PEquiv open Matrix universe u v variable {k l m n : Type} variable {α : Type v} open Matrix def toMatrix [DecidableEq n] [Zero α] [One α] (f : m ≃. n) : Matrix m n α := of fun i j => if j ∈ f i then (1 : α) else 0 #align pequiv.to_matrix PEquiv.toMatrix -- TODO: set as an equation lemma for `toMatrix`, see mathlib4#3024 @[simp] theorem toMatrix_apply [DecidableEq n] [Zero α] [One α] (f : m ≃. n) (i j) : toMatrix f i j = if j ∈ f i then (1 : α) else 0 := rfl #align pequiv.to_matrix_apply PEquiv.toMatrix_apply theorem mul_matrix_apply [Fintype m] [DecidableEq m] [Semiring α] (f : l ≃. m) (M : Matrix m n α) (i j) : (f.toMatrix M :) i j = Option.casesOn (f i) 0 fun fi => M fi j := by dsimp [toMatrix, Matrix.mul_apply] cases' h : f i with fi · simp [h] · rw [Finset.sum_eq_single fi] <;> simp (config := { contextual := true }) [h, eq_comm] #align pequiv.mul_matrix_apply PEquiv.mul_matrix_apply theorem toMatrix_symm [DecidableEq m] [DecidableEq n] [Zero α] [One α] (f : m ≃. n) : (f.symm.toMatrix : Matrix n m α) = f.toMatrixᵀ := by ext simp only [transpose, mem_iff_mem f, toMatrix_apply] congr #align pequiv.to_matrix_symm PEquiv.toMatrix_symm @[simp] theorem toMatrix_refl [DecidableEq n] [Zero α] [One α] : ((PEquiv.refl n).toMatrix : Matrix n n α) = 1 := by ext simp [toMatrix_apply, one_apply] #align pequiv.to_matrix_refl PEquiv.toMatrix_refl theorem matrix_mul_apply [Fintype m] [Semiring α] [DecidableEq n] (M : Matrix l m α) (f : m ≃. n) (i j) : (M * f.toMatrix :) i j = Option.casesOn (f.symm j) 0 fun fj => M i fj := by dsimp [toMatrix, Matrix.mul_apply] cases' h : f.symm j with fj · simp [h, ← f.eq_some_iff] · rw [Finset.sum_eq_single fj] · simp [h, ← f.eq_some_iff] · rintro b - n simp [h, ← f.eq_some_iff, n.symm] · simp #align pequiv.matrix_mul_apply PEquiv.matrix_mul_apply theorem toPEquiv_mul_matrix [Fintype m] [DecidableEq m] [Semiring α] (f : m ≃ m) (M : Matrix m n α) : f.toPEquiv.toMatrix * M = M.submatrix f id := by ext i j rw [mul_matrix_apply, Equiv.toPEquiv_apply, submatrix_apply, id] #align pequiv.to_pequiv_mul_matrix PEquiv.toPEquiv_mul_matrix theorem mul_toPEquiv_toMatrix {m n α : Type} [Fintype n] [DecidableEq n] [Semiring α] (f : n ≃ n) (M : Matrix m n α) : M f.toPEquiv.toMatrix = M.submatrix id f.symm := Matrix.ext fun i j => by rw [PEquiv.matrix_mul_apply, ← Equiv.toPEquiv_symm, Equiv.toPEquiv_apply, Matrix.submatrix_apply, id] #align pequiv.mul_to_pequiv_to_matrix PEquiv.mul_toPEquiv_toMatrix theorem toMatrix_trans [Fintype m] [DecidableEq m] [DecidableEq n] [Semiring α] (f : l ≃. m) (g : m ≃. n) : ((f.trans g).toMatrix : Matrix l n α) = f.toMatrix * g.toMatrix := by ext i j rw [mul_matrix_apply] dsimp [toMatrix, PEquiv.trans] cases f i <;> simp #align pequiv.to_matrix_trans PEquiv.toMatrix_trans @[simp] theorem toMatrix_bot [DecidableEq n] [Zero α] [One α] : ((⊥ : PEquiv m n).toMatrix : Matrix m n α) = 0 := rfl #align pequiv.to_matrix_bot PEquiv.toMatrix_bot	Mathlib/Data/Matrix/PEquiv.lean	123	139	theorem toMatrix_injective [DecidableEq n] [MonoidWithZero α] [Nontrivial α] : Function.Injective (@toMatrix m n α _ _ _) := by	classical intro f g refine not_imp_not.1 ?_ simp only [Matrix.ext_iff.symm, toMatrix_apply, PEquiv.ext_iff, not_forall, exists_imp] intro i hi use i cases' hf : f i with fi · cases' hg : g i with gi -- Porting note: was `cc` · rw [hf, hg] at hi exact (hi rfl).elim · use gi simp · use fi simp [hf.symm, Ne.symm hi]
import Mathlib.Probability.Martingale.Convergence import Mathlib.Probability.Martingale.OptionalStopping import Mathlib.Probability.Martingale.Centering #align_import probability.martingale.borel_cantelli from "leanprover-community/mathlib"@"2196ab363eb097c008d4497125e0dde23fb36db2" open Filter open scoped NNReal ENNReal MeasureTheory ProbabilityTheory BigOperators Topology namespace MeasureTheory variable {Ω : Type} {m0 : MeasurableSpace Ω} {μ : Measure Ω} {ℱ : Filtration ℕ m0} {f : ℕ → Ω → ℝ} {ω : Ω} -- TODO: `leastGE` should be defined taking values in `WithTop ℕ` once the `stoppedProcess` -- refactor is complete noncomputable def leastGE (f : ℕ → Ω → ℝ) (r : ℝ) (n : ℕ) := hitting f (Set.Ici r) 0 n #align measure_theory.least_ge MeasureTheory.leastGE theorem Adapted.isStoppingTime_leastGE (r : ℝ) (n : ℕ) (hf : Adapted ℱ f) : IsStoppingTime ℱ (leastGE f r n) := hitting_isStoppingTime hf measurableSet_Ici #align measure_theory.adapted.is_stopping_time_least_ge MeasureTheory.Adapted.isStoppingTime_leastGE theorem leastGE_le {i : ℕ} {r : ℝ} (ω : Ω) : leastGE f r i ω ≤ i := hitting_le ω #align measure_theory.least_ge_le MeasureTheory.leastGE_le -- The following four lemmas shows `leastGE` behaves like a stopped process. Ideally we should -- define `leastGE` as a stopping time and take its stopped process. However, we can't do that -- with our current definition since a stopping time takes only finite indicies. An upcomming -- refactor should hopefully make it possible to have stopping times taking infinity as a value theorem leastGE_mono {n m : ℕ} (hnm : n ≤ m) (r : ℝ) (ω : Ω) : leastGE f r n ω ≤ leastGE f r m ω := hitting_mono hnm #align measure_theory.least_ge_mono MeasureTheory.leastGE_mono theorem leastGE_eq_min (π : Ω → ℕ) (r : ℝ) (ω : Ω) {n : ℕ} (hπn : ∀ ω, π ω ≤ n) : leastGE f r (π ω) ω = min (π ω) (leastGE f r n ω) := by classical refine le_antisymm (le_min (leastGE_le _) (leastGE_mono (hπn ω) r ω)) ?_ by_cases hle : π ω ≤ leastGE f r n ω · rw [min_eq_left hle, leastGE] by_cases h : ∃ j ∈ Set.Icc 0 (π ω), f j ω ∈ Set.Ici r · refine hle.trans (Eq.le ?_) rw [leastGE, ← hitting_eq_hitting_of_exists (hπn ω) h] · simp only [hitting, if_neg h, le_rfl] · rw [min_eq_right (not_le.1 hle).le, leastGE, leastGE, ← hitting_eq_hitting_of_exists (hπn ω) _] rw [not_le, leastGE, hitting_lt_iff _ (hπn ω)] at hle exact let ⟨j, hj₁, hj₂⟩ := hle ⟨j, ⟨hj₁.1, hj₁.2.le⟩, hj₂⟩ #align measure_theory.least_ge_eq_min MeasureTheory.leastGE_eq_min theorem stoppedValue_stoppedValue_leastGE (f : ℕ → Ω → ℝ) (π : Ω → ℕ) (r : ℝ) {n : ℕ} (hπn : ∀ ω, π ω ≤ n) : stoppedValue (fun i => stoppedValue f (leastGE f r i)) π = stoppedValue (stoppedProcess f (leastGE f r n)) π := by ext1 ω simp (config := { unfoldPartialApp := true }) only [stoppedProcess, stoppedValue] rw [leastGE_eq_min _ _ _ hπn] #align measure_theory.stopped_value_stopped_value_least_ge MeasureTheory.stoppedValue_stoppedValue_leastGE theorem Submartingale.stoppedValue_leastGE [IsFiniteMeasure μ] (hf : Submartingale f ℱ μ) (r : ℝ) : Submartingale (fun i => stoppedValue f (leastGE f r i)) ℱ μ := by rw [submartingale_iff_expected_stoppedValue_mono] · intro σ π hσ hπ hσ_le_π hπ_bdd obtain ⟨n, hπ_le_n⟩ := hπ_bdd simp_rw [stoppedValue_stoppedValue_leastGE f σ r fun i => (hσ_le_π i).trans (hπ_le_n i)] simp_rw [stoppedValue_stoppedValue_leastGE f π r hπ_le_n] refine hf.expected_stoppedValue_mono ?_ ?_ ?_ fun ω => (min_le_left _ _).trans (hπ_le_n ω) · exact hσ.min (hf.adapted.isStoppingTime_leastGE _ _) · exact hπ.min (hf.adapted.isStoppingTime_leastGE _ _) · exact fun ω => min_le_min (hσ_le_π ω) le_rfl · exact fun i => stronglyMeasurable_stoppedValue_of_le hf.adapted.progMeasurable_of_discrete (hf.adapted.isStoppingTime_leastGE _ _) leastGE_le · exact fun i => integrable_stoppedValue _ (hf.adapted.isStoppingTime_leastGE _ _) hf.integrable leastGE_le #align measure_theory.submartingale.stopped_value_least_ge MeasureTheory.Submartingale.stoppedValue_leastGE variable {r : ℝ} {R : ℝ≥0} theorem norm_stoppedValue_leastGE_le (hr : 0 ≤ r) (hf0 : f 0 = 0) (hbdd : ∀ᵐ ω ∂μ, ∀ i, \|f (i + 1) ω - f i ω\| ≤ R) (i : ℕ) : ∀ᵐ ω ∂μ, stoppedValue f (leastGE f r i) ω ≤ r + R := by filter_upwards [hbdd] with ω hbddω change f (leastGE f r i ω) ω ≤ r + R by_cases heq : leastGE f r i ω = 0 · rw [heq, hf0, Pi.zero_apply] exact add_nonneg hr R.coe_nonneg · obtain ⟨k, hk⟩ := Nat.exists_eq_succ_of_ne_zero heq rw [hk, add_comm, ← sub_le_iff_le_add] have := not_mem_of_lt_hitting (hk.symm ▸ k.lt_succ_self : k < leastGE f r i ω) (zero_le _) simp only [Set.mem_union, Set.mem_Iic, Set.mem_Ici, not_or, not_le] at this exact (sub_lt_sub_left this _).le.trans ((le_abs_self _).trans (hbddω _)) #align measure_theory.norm_stopped_value_least_ge_le MeasureTheory.norm_stoppedValue_leastGE_le theorem Submartingale.stoppedValue_leastGE_snorm_le [IsFiniteMeasure μ] (hf : Submartingale f ℱ μ) (hr : 0 ≤ r) (hf0 : f 0 = 0) (hbdd : ∀ᵐ ω ∂μ, ∀ i, \|f (i + 1) ω - f i ω\| ≤ R) (i : ℕ) : snorm (stoppedValue f (leastGE f r i)) 1 μ ≤ 2 μ Set.univ * ENNReal.ofReal (r + R) := by refine snorm_one_le_of_le' ((hf.stoppedValue_leastGE r).integrable _) ?_ (norm_stoppedValue_leastGE_le hr hf0 hbdd i) rw [← integral_univ] refine le_trans ?_ ((hf.stoppedValue_leastGE r).setIntegral_le (zero_le _) MeasurableSet.univ) simp_rw [stoppedValue, leastGE, hitting_of_le le_rfl, hf0, integral_zero', le_rfl] #align measure_theory.submartingale.stopped_value_least_ge_snorm_le MeasureTheory.Submartingale.stoppedValue_leastGE_snorm_le theorem Submartingale.stoppedValue_leastGE_snorm_le' [IsFiniteMeasure μ] (hf : Submartingale f ℱ μ) (hr : 0 ≤ r) (hf0 : f 0 = 0) (hbdd : ∀ᵐ ω ∂μ, ∀ i, \|f (i + 1) ω - f i ω\| ≤ R) (i : ℕ) : snorm (stoppedValue f (leastGE f r i)) 1 μ ≤ ENNReal.toNNReal (2 * μ Set.univ * ENNReal.ofReal (r + R)) := by refine (hf.stoppedValue_leastGE_snorm_le hr hf0 hbdd i).trans ?_ simp [ENNReal.coe_toNNReal (measure_ne_top μ _), ENNReal.coe_toNNReal] #align measure_theory.submartingale.stopped_value_least_ge_snorm_le' MeasureTheory.Submartingale.stoppedValue_leastGE_snorm_le' theorem Submartingale.exists_tendsto_of_abs_bddAbove_aux [IsFiniteMeasure μ] (hf : Submartingale f ℱ μ) (hf0 : f 0 = 0) (hbdd : ∀ᵐ ω ∂μ, ∀ i, \|f (i + 1) ω - f i ω\| ≤ R) : ∀ᵐ ω ∂μ, BddAbove (Set.range fun n => f n ω) → ∃ c, Tendsto (fun n => f n ω) atTop (𝓝 c) := by have ht : ∀ᵐ ω ∂μ, ∀ i : ℕ, ∃ c, Tendsto (fun n => stoppedValue f (leastGE f i n) ω) atTop (𝓝 c) := by rw [ae_all_iff] exact fun i => Submartingale.exists_ae_tendsto_of_bdd (hf.stoppedValue_leastGE i) (hf.stoppedValue_leastGE_snorm_le' i.cast_nonneg hf0 hbdd) filter_upwards [ht] with ω hω hωb rw [BddAbove] at hωb obtain ⟨i, hi⟩ := exists_nat_gt hωb.some have hib : ∀ n, f n ω < i := by intro n exact lt_of_le_of_lt ((mem_upperBounds.1 hωb.some_mem) _ ⟨n, rfl⟩) hi have heq : ∀ n, stoppedValue f (leastGE f i n) ω = f n ω := by intro n rw [leastGE]; unfold hitting; rw [stoppedValue] rw [if_neg] simp only [Set.mem_Icc, Set.mem_union, Set.mem_Ici] push_neg exact fun j _ => hib j simp only [← heq, hω i] #align measure_theory.submartingale.exists_tendsto_of_abs_bdd_above_aux MeasureTheory.Submartingale.exists_tendsto_of_abs_bddAbove_aux theorem Submartingale.bddAbove_iff_exists_tendsto_aux [IsFiniteMeasure μ] (hf : Submartingale f ℱ μ) (hf0 : f 0 = 0) (hbdd : ∀ᵐ ω ∂μ, ∀ i, \|f (i + 1) ω - f i ω\| ≤ R) : ∀ᵐ ω ∂μ, BddAbove (Set.range fun n => f n ω) ↔ ∃ c, Tendsto (fun n => f n ω) atTop (𝓝 c) := by filter_upwards [hf.exists_tendsto_of_abs_bddAbove_aux hf0 hbdd] with ω hω using ⟨hω, fun ⟨c, hc⟩ => hc.bddAbove_range⟩ #align measure_theory.submartingale.bdd_above_iff_exists_tendsto_aux MeasureTheory.Submartingale.bddAbove_iff_exists_tendsto_aux theorem Submartingale.bddAbove_iff_exists_tendsto [IsFiniteMeasure μ] (hf : Submartingale f ℱ μ) (hbdd : ∀ᵐ ω ∂μ, ∀ i, \|f (i + 1) ω - f i ω\| ≤ R) : ∀ᵐ ω ∂μ, BddAbove (Set.range fun n => f n ω) ↔ ∃ c, Tendsto (fun n => f n ω) atTop (𝓝 c) := by set g : ℕ → Ω → ℝ := fun n ω => f n ω - f 0 ω have hg : Submartingale g ℱ μ := hf.sub_martingale (martingale_const_fun _ _ (hf.adapted 0) (hf.integrable 0)) have hg0 : g 0 = 0 := by ext ω simp only [g, sub_self, Pi.zero_apply] have hgbdd : ∀ᵐ ω ∂μ, ∀ i : ℕ, \|g (i + 1) ω - g i ω\| ≤ ↑R := by simpa only [g, sub_sub_sub_cancel_right] filter_upwards [hg.bddAbove_iff_exists_tendsto_aux hg0 hgbdd] with ω hω convert hω using 1 · refine ⟨fun h => ?_, fun h => ?_⟩ <;> obtain ⟨b, hb⟩ := h <;> refine ⟨b + \|f 0 ω\|, fun y hy => ?_⟩ <;> obtain ⟨n, rfl⟩ := hy · simp_rw [g, sub_eq_add_neg] exact add_le_add (hb ⟨n, rfl⟩) (neg_le_abs _) · exact sub_le_iff_le_add.1 (le_trans (sub_le_sub_left (le_abs_self _) _) (hb ⟨n, rfl⟩)) · refine ⟨fun h => ?_, fun h => ?_⟩ <;> obtain ⟨c, hc⟩ := h · exact ⟨c - f 0 ω, hc.sub_const _⟩ · refine ⟨c + f 0 ω, ?_⟩ have := hc.add_const (f 0 ω) simpa only [g, sub_add_cancel] #align measure_theory.submartingale.bdd_above_iff_exists_tendsto MeasureTheory.Submartingale.bddAbove_iff_exists_tendsto theorem Martingale.bddAbove_range_iff_bddBelow_range [IsFiniteMeasure μ] (hf : Martingale f ℱ μ) (hbdd : ∀ᵐ ω ∂μ, ∀ i, \|f (i + 1) ω - f i ω\| ≤ R) : ∀ᵐ ω ∂μ, BddAbove (Set.range fun n => f n ω) ↔ BddBelow (Set.range fun n => f n ω) := by have hbdd' : ∀ᵐ ω ∂μ, ∀ i, \|(-f) (i + 1) ω - (-f) i ω\| ≤ R := by filter_upwards [hbdd] with ω hω i erw [← abs_neg, neg_sub, sub_neg_eq_add, neg_add_eq_sub] exact hω i have hup := hf.submartingale.bddAbove_iff_exists_tendsto hbdd have hdown := hf.neg.submartingale.bddAbove_iff_exists_tendsto hbdd' filter_upwards [hup, hdown] with ω hω₁ hω₂ have : (∃ c, Tendsto (fun n => f n ω) atTop (𝓝 c)) ↔ ∃ c, Tendsto (fun n => (-f) n ω) atTop (𝓝 c) := by constructor <;> rintro ⟨c, hc⟩ · exact ⟨-c, hc.neg⟩ · refine ⟨-c, ?_⟩ convert hc.neg simp only [neg_neg, Pi.neg_apply] rw [hω₁, this, ← hω₂] constructor <;> rintro ⟨c, hc⟩ <;> refine ⟨-c, fun ω hω => ?_⟩ · rw [mem_upperBounds] at hc refine neg_le.2 (hc _ ?_) simpa only [Pi.neg_apply, Set.mem_range, neg_inj] · rw [mem_lowerBounds] at hc simp_rw [Set.mem_range, Pi.neg_apply, neg_eq_iff_eq_neg] at hω refine le_neg.1 (hc _ ?_) simpa only [Set.mem_range] #align measure_theory.martingale.bdd_above_range_iff_bdd_below_range MeasureTheory.Martingale.bddAbove_range_iff_bddBelow_range theorem Martingale.ae_not_tendsto_atTop_atTop [IsFiniteMeasure μ] (hf : Martingale f ℱ μ) (hbdd : ∀ᵐ ω ∂μ, ∀ i, \|f (i + 1) ω - f i ω\| ≤ R) : ∀ᵐ ω ∂μ, ¬Tendsto (fun n => f n ω) atTop atTop := by filter_upwards [hf.bddAbove_range_iff_bddBelow_range hbdd] with ω hω htop using unbounded_of_tendsto_atTop htop (hω.2 <\| bddBelow_range_of_tendsto_atTop_atTop htop) #align measure_theory.martingale.ae_not_tendsto_at_top_at_top MeasureTheory.Martingale.ae_not_tendsto_atTop_atTop theorem Martingale.ae_not_tendsto_atTop_atBot [IsFiniteMeasure μ] (hf : Martingale f ℱ μ) (hbdd : ∀ᵐ ω ∂μ, ∀ i, \|f (i + 1) ω - f i ω\| ≤ R) : ∀ᵐ ω ∂μ, ¬Tendsto (fun n => f n ω) atTop atBot := by filter_upwards [hf.bddAbove_range_iff_bddBelow_range hbdd] with ω hω htop using unbounded_of_tendsto_atBot htop (hω.1 <\| bddAbove_range_of_tendsto_atTop_atBot htop) #align measure_theory.martingale.ae_not_tendsto_at_top_at_bot MeasureTheory.Martingale.ae_not_tendsto_atTop_atBot namespace BorelCantelli noncomputable def process (s : ℕ → Set Ω) (n : ℕ) : Ω → ℝ := ∑ k ∈ Finset.range n, (s (k + 1)).indicator 1 #align measure_theory.borel_cantelli.process MeasureTheory.BorelCantelli.process variable {s : ℕ → Set Ω}	Mathlib/Probability/Martingale/BorelCantelli.lean	287	287	theorem process_zero : process s 0 = 0 := by	rw [process, Finset.range_zero, Finset.sum_empty]
import Mathlib.Computability.Partrec import Mathlib.Data.Option.Basic #align_import computability.partrec_code from "leanprover-community/mathlib"@"6155d4351090a6fad236e3d2e4e0e4e7342668e8" open Encodable Denumerable nd namespace Nat.Partrec.Code section open Computable theorem rec_computable {α σ} [Primcodable α] [Primcodable σ] {c : α → Code} (hc : Computable c) {z : α → σ} (hz : Computable z) {s : α → σ} (hs : Computable s) {l : α → σ} (hl : Computable l) {r : α → σ} (hr : Computable r) {pr : α → Code × Code × σ × σ → σ} (hpr : Computable₂ pr) {co : α → Code × Code × σ × σ → σ} (hco : Computable₂ co) {pc : α → Code × Code × σ × σ → σ} (hpc : Computable₂ pc) {rf : α → Code × σ → σ} (hrf : Computable₂ rf) : let PR (a) cf cg hf hg := pr a (cf, cg, hf, hg) let CO (a) cf cg hf hg := co a (cf, cg, hf, hg) let PC (a) cf cg hf hg := pc a (cf, cg, hf, hg) let RF (a) cf hf := rf a (cf, hf) let F (a : α) (c : Code) : σ := Nat.Partrec.Code.recOn c (z a) (s a) (l a) (r a) (PR a) (CO a) (PC a) (RF a) Computable fun a => F a (c a) := by -- TODO(Mario): less copy-paste from previous proof intros _ _ _ _ F let G₁ : (α × List σ) × ℕ × ℕ → Option σ := fun p => letI a := p.1.1; letI IH := p.1.2; letI n := p.2.1; letI m := p.2.2 (IH.get? m).bind fun s => (IH.get? m.unpair.1).bind fun s₁ => (IH.get? m.unpair.2).map fun s₂ => cond n.bodd (cond n.div2.bodd (rf a (ofNat Code m, s)) (pc a (ofNat Code m.unpair.1, ofNat Code m.unpair.2, s₁, s₂))) (cond n.div2.bodd (co a (ofNat Code m.unpair.1, ofNat Code m.unpair.2, s₁, s₂)) (pr a (ofNat Code m.unpair.1, ofNat Code m.unpair.2, s₁, s₂))) have : Computable G₁ := by refine option_bind (list_get?.comp (snd.comp fst) (snd.comp snd)) <\| .mk ?_ refine option_bind ((list_get?.comp (snd.comp fst) (fst.comp <\| Computable.unpair.comp (snd.comp snd))).comp fst) <\| .mk ?_ refine option_map ((list_get?.comp (snd.comp fst) (snd.comp <\| Computable.unpair.comp (snd.comp snd))).comp <\| fst.comp fst) <\| .mk ?_ exact have a := fst.comp (fst.comp <\| fst.comp <\| fst.comp fst) have n := fst.comp (snd.comp <\| fst.comp <\| fst.comp fst) have m := snd.comp (snd.comp <\| fst.comp <\| fst.comp fst) have m₁ := fst.comp (Computable.unpair.comp m) have m₂ := snd.comp (Computable.unpair.comp m) have s := snd.comp (fst.comp fst) have s₁ := snd.comp fst have s₂ := snd (nat_bodd.comp n).cond ((nat_bodd.comp <\| nat_div2.comp n).cond (hrf.comp a (((Computable.ofNat Code).comp m).pair s)) (hpc.comp a (((Computable.ofNat Code).comp m₁).pair <\| ((Computable.ofNat Code).comp m₂).pair <\| s₁.pair s₂))) (Computable.cond (nat_bodd.comp <\| nat_div2.comp n) (hco.comp a (((Computable.ofNat Code).comp m₁).pair <\| ((Computable.ofNat Code).comp m₂).pair <\| s₁.pair s₂)) (hpr.comp a (((Computable.ofNat Code).comp m₁).pair <\| ((Computable.ofNat Code).comp m₂).pair <\| s₁.pair s₂))) let G : α → List σ → Option σ := fun a IH => IH.length.casesOn (some (z a)) fun n => n.casesOn (some (s a)) fun n => n.casesOn (some (l a)) fun n => n.casesOn (some (r a)) fun n => G₁ ((a, IH), n, n.div2.div2) have : Computable₂ G := .mk <\| nat_casesOn (list_length.comp snd) (option_some_iff.2 (hz.comp fst)) <\| .mk <\| nat_casesOn snd (option_some_iff.2 (hs.comp (fst.comp fst))) <\| .mk <\| nat_casesOn snd (option_some_iff.2 (hl.comp (fst.comp <\| fst.comp fst))) <\| .mk <\| nat_casesOn snd (option_some_iff.2 (hr.comp (fst.comp <\| fst.comp <\| fst.comp fst))) <\| .mk <\| this.comp <\| ((fst.pair snd).comp <\| fst.comp <\| fst.comp <\| fst.comp <\| fst).pair <\| snd.pair <\| nat_div2.comp <\| nat_div2.comp snd refine (nat_strong_rec (fun a n => F a (ofNat Code n)) this.to₂ fun a n => ?_) \|>.comp .id (encode_iff.2 hc) \|>.of_eq fun a => by simp simp iterate 4 cases' n with n; · simp [ofNatCode_eq, ofNatCode]; rfl simp only [G]; rw [List.length_map, List.length_range] let m := n.div2.div2 show G₁ ((a, (List.range (n + 4)).map fun n => F a (ofNat Code n)), n, m) = some (F a (ofNat Code (n + 4))) have hm : m < n + 4 := by simp only [m, div2_val] exact lt_of_le_of_lt (le_trans (Nat.div_le_self ..) (Nat.div_le_self ..)) (Nat.succ_le_succ (Nat.le_add_right ..)) have m1 : m.unpair.1 < n + 4 := lt_of_le_of_lt m.unpair_left_le hm have m2 : m.unpair.2 < n + 4 := lt_of_le_of_lt m.unpair_right_le hm simp [G₁]; simp [m, List.get?_map, List.get?_range, hm, m1, m2] rw [show ofNat Code (n + 4) = ofNatCode (n + 4) from rfl] simp [ofNatCode] cases n.bodd <;> cases n.div2.bodd <;> rfl #align nat.partrec.code.rec_computable Nat.Partrec.Code.rec_computable end def eval : Code → ℕ →. ℕ \| zero => pure 0 \| succ => Nat.succ \| left => ↑fun n : ℕ => n.unpair.1 \| right => ↑fun n : ℕ => n.unpair.2 \| pair cf cg => fun n => Nat.pair <$> eval cf n <> eval cg n \| comp cf cg => fun n => eval cg n >>= eval cf \| prec cf cg => Nat.unpaired fun a n => n.rec (eval cf a) fun y IH => do let i ← IH eval cg (Nat.pair a (Nat.pair y i)) \| rfind' cf => Nat.unpaired fun a m => (Nat.rfind fun n => (fun m => m = 0) <$> eval cf (Nat.pair a (n + m))).map (· + m) #align nat.partrec.code.eval Nat.Partrec.Code.eval @[simp] theorem eval_prec_zero (cf cg : Code) (a : ℕ) : eval (prec cf cg) (Nat.pair a 0) = eval cf a := by rw [eval, Nat.unpaired, Nat.unpair_pair] simp (config := { Lean.Meta.Simp.neutralConfig with proj := true }) only [] rw [Nat.rec_zero] #align nat.partrec.code.eval_prec_zero Nat.Partrec.Code.eval_prec_zero theorem eval_prec_succ (cf cg : Code) (a k : ℕ) : eval (prec cf cg) (Nat.pair a (Nat.succ k)) = do {let ih ← eval (prec cf cg) (Nat.pair a k); eval cg (Nat.pair a (Nat.pair k ih))} := by rw [eval, Nat.unpaired, Part.bind_eq_bind, Nat.unpair_pair] simp #align nat.partrec.code.eval_prec_succ Nat.Partrec.Code.eval_prec_succ instance : Membership (ℕ →. ℕ) Code := ⟨fun f c => eval c = f⟩ @[simp] theorem eval_const : ∀ n m, eval (Code.const n) m = Part.some n \| 0, m => rfl \| n + 1, m => by simp! [eval_const n m] #align nat.partrec.code.eval_const Nat.Partrec.Code.eval_const @[simp] theorem eval_id (n) : eval Code.id n = Part.some n := by simp! [Seq.seq] #align nat.partrec.code.eval_id Nat.Partrec.Code.eval_id @[simp] theorem eval_curry (c n x) : eval (curry c n) x = eval c (Nat.pair n x) := by simp! [Seq.seq] #align nat.partrec.code.eval_curry Nat.Partrec.Code.eval_curry theorem const_prim : Primrec Code.const := (_root_.Primrec.id.nat_iterate (_root_.Primrec.const zero) (comp_prim.comp (_root_.Primrec.const succ) Primrec.snd).to₂).of_eq fun n => by simp; induction n <;> simp [, Code.const, Function.iterate_succ', -Function.iterate_succ] #align nat.partrec.code.const_prim Nat.Partrec.Code.const_prim theorem curry_prim : Primrec₂ curry := comp_prim.comp Primrec.fst <\| pair_prim.comp (const_prim.comp Primrec.snd) (_root_.Primrec.const Code.id) #align nat.partrec.code.curry_prim Nat.Partrec.Code.curry_prim theorem curry_inj {c₁ c₂ n₁ n₂} (h : curry c₁ n₁ = curry c₂ n₂) : c₁ = c₂ ∧ n₁ = n₂ := ⟨by injection h, by injection h with h₁ h₂ injection h₂ with h₃ h₄ exact const_inj h₃⟩ #align nat.partrec.code.curry_inj Nat.Partrec.Code.curry_inj theorem smn : ∃ f : Code → ℕ → Code, Computable₂ f ∧ ∀ c n x, eval (f c n) x = eval c (Nat.pair n x) := ⟨curry, Primrec₂.to_comp curry_prim, eval_curry⟩ #align nat.partrec.code.smn Nat.Partrec.Code.smn theorem exists_code {f : ℕ →. ℕ} : Nat.Partrec f ↔ ∃ c : Code, eval c = f := by refine ⟨fun h => ?_, ?_⟩ · induction h with \| zero => exact ⟨zero, rfl⟩ \| succ => exact ⟨succ, rfl⟩ \| left => exact ⟨left, rfl⟩ \| right => exact ⟨right, rfl⟩ \| pair pf pg hf hg => rcases hf with ⟨cf, rfl⟩; rcases hg with ⟨cg, rfl⟩ exact ⟨pair cf cg, rfl⟩ \| comp pf pg hf hg => rcases hf with ⟨cf, rfl⟩; rcases hg with ⟨cg, rfl⟩ exact ⟨comp cf cg, rfl⟩ \| prec pf pg hf hg => rcases hf with ⟨cf, rfl⟩; rcases hg with ⟨cg, rfl⟩ exact ⟨prec cf cg, rfl⟩ \| rfind pf hf => rcases hf with ⟨cf, rfl⟩ refine ⟨comp (rfind' cf) (pair Code.id zero), ?_⟩ simp [eval, Seq.seq, pure, PFun.pure, Part.map_id'] · rintro ⟨c, rfl⟩ induction c with \| zero => exact Nat.Partrec.zero \| succ => exact Nat.Partrec.succ \| left => exact Nat.Partrec.left \| right => exact Nat.Partrec.right \| pair cf cg pf pg => exact pf.pair pg \| comp cf cg pf pg => exact pf.comp pg \| prec cf cg pf pg => exact pf.prec pg \| rfind' cf pf => exact pf.rfind' #align nat.partrec.code.exists_code Nat.Partrec.Code.exists_code -- Porting note: `>>`s in `evaln` are now `>>=` because `>>`s are not elaborated well in Lean4. def evaln : ℕ → Code → ℕ → Option ℕ \| 0, _ => fun _ => Option.none \| k + 1, zero => fun n => do guard (n ≤ k) return 0 \| k + 1, succ => fun n => do guard (n ≤ k) return (Nat.succ n) \| k + 1, left => fun n => do guard (n ≤ k) return n.unpair.1 \| k + 1, right => fun n => do guard (n ≤ k) pure n.unpair.2 \| k + 1, pair cf cg => fun n => do guard (n ≤ k) Nat.pair <$> evaln (k + 1) cf n <*> evaln (k + 1) cg n \| k + 1, comp cf cg => fun n => do guard (n ≤ k) let x ← evaln (k + 1) cg n evaln (k + 1) cf x \| k + 1, prec cf cg => fun n => do guard (n ≤ k) n.unpaired fun a n => n.casesOn (evaln (k + 1) cf a) fun y => do let i ← evaln k (prec cf cg) (Nat.pair a y) evaln (k + 1) cg (Nat.pair a (Nat.pair y i)) \| k + 1, rfind' cf => fun n => do guard (n ≤ k) n.unpaired fun a m => do let x ← evaln (k + 1) cf (Nat.pair a m) if x = 0 then pure m else evaln k (rfind' cf) (Nat.pair a (m + 1)) #align nat.partrec.code.evaln Nat.Partrec.Code.evaln theorem evaln_bound : ∀ {k c n x}, x ∈ evaln k c n → n < k \| 0, c, n, x, h => by simp [evaln] at h \| k + 1, c, n, x, h => by suffices ∀ {o : Option ℕ}, x ∈ do { guard (n ≤ k); o } → n < k + 1 by cases c <;> rw [evaln] at h <;> exact this h simpa [Option.bind_eq_some] using Nat.lt_succ_of_le #align nat.partrec.code.evaln_bound Nat.Partrec.Code.evaln_bound theorem evaln_mono : ∀ {k₁ k₂ c n x}, k₁ ≤ k₂ → x ∈ evaln k₁ c n → x ∈ evaln k₂ c n \| 0, k₂, c, n, x, _, h => by simp [evaln] at h \| k + 1, k₂ + 1, c, n, x, hl, h => by have hl' := Nat.le_of_succ_le_succ hl have : ∀ {k k₂ n x : ℕ} {o₁ o₂ : Option ℕ}, k ≤ k₂ → (x ∈ o₁ → x ∈ o₂) → x ∈ do { guard (n ≤ k); o₁ } → x ∈ do { guard (n ≤ k₂); o₂ } := by simp only [Option.mem_def, bind, Option.bind_eq_some, Option.guard_eq_some', exists_and_left, exists_const, and_imp] introv h h₁ h₂ h₃ exact ⟨le_trans h₂ h, h₁ h₃⟩ simp? at h ⊢ says simp only [Option.mem_def] at h ⊢ induction' c with cf cg hf hg cf cg hf hg cf cg hf hg cf hf generalizing x n <;> rw [evaln] at h ⊢ <;> refine this hl' (fun h => ?_) h iterate 4 exact h · -- pair cf cg simp? [Seq.seq, Option.bind_eq_some] at h ⊢ says simp only [Seq.seq, Option.map_eq_map, Option.mem_def, Option.bind_eq_some, Option.map_eq_some', exists_exists_and_eq_and] at h ⊢ exact h.imp fun a => And.imp (hf _ _) <\| Exists.imp fun b => And.imp_left (hg _ _) · -- comp cf cg simp? [Bind.bind, Option.bind_eq_some] at h ⊢ says simp only [bind, Option.mem_def, Option.bind_eq_some] at h ⊢ exact h.imp fun a => And.imp (hg _ _) (hf _ _) · -- prec cf cg revert h simp only [unpaired, bind, Option.mem_def] induction n.unpair.2 <;> simp [Option.bind_eq_some] · apply hf · exact fun y h₁ h₂ => ⟨y, evaln_mono hl' h₁, hg _ _ h₂⟩ · -- rfind' cf simp? [Bind.bind, Option.bind_eq_some] at h ⊢ says simp only [unpaired, bind, pair_unpair, Option.pure_def, Option.mem_def, Option.bind_eq_some] at h ⊢ refine h.imp fun x => And.imp (hf _ _) ?_ by_cases x0 : x = 0 <;> simp [x0] exact evaln_mono hl' #align nat.partrec.code.evaln_mono Nat.Partrec.Code.evaln_mono theorem evaln_sound : ∀ {k c n x}, x ∈ evaln k c n → x ∈ eval c n \| 0, _, n, x, h => by simp [evaln] at h \| k + 1, c, n, x, h => by induction' c with cf cg hf hg cf cg hf hg cf cg hf hg cf hf generalizing x n <;> simp [eval, evaln, Option.bind_eq_some, Seq.seq] at h ⊢ <;> cases' h with _ h iterate 4 simpa [pure, PFun.pure, eq_comm] using h · -- pair cf cg rcases h with ⟨y, ef, z, eg, rfl⟩ exact ⟨_, hf _ _ ef, _, hg _ _ eg, rfl⟩ · --comp hf hg rcases h with ⟨y, eg, ef⟩ exact ⟨_, hg _ _ eg, hf _ _ ef⟩ · -- prec cf cg revert h induction' n.unpair.2 with m IH generalizing x <;> simp [Option.bind_eq_some] · apply hf · refine fun y h₁ h₂ => ⟨y, IH _ ?_, ?_⟩ · have := evaln_mono k.le_succ h₁ simp [evaln, Option.bind_eq_some] at this exact this.2 · exact hg _ _ h₂ · -- rfind' cf rcases h with ⟨m, h₁, h₂⟩ by_cases m0 : m = 0 <;> simp [m0] at h₂ · exact ⟨0, ⟨by simpa [m0] using hf _ _ h₁, fun {m} => (Nat.not_lt_zero _).elim⟩, by simp [h₂]⟩ · have := evaln_sound h₂ simp [eval] at this rcases this with ⟨y, ⟨hy₁, hy₂⟩, rfl⟩ refine ⟨y + 1, ⟨by simpa [add_comm, add_left_comm] using hy₁, fun {i} im => ?_⟩, by simp [add_comm, add_left_comm]⟩ cases' i with i · exact ⟨m, by simpa using hf _ _ h₁, m0⟩ · rcases hy₂ (Nat.lt_of_succ_lt_succ im) with ⟨z, hz, z0⟩ exact ⟨z, by simpa [Nat.succ_eq_add_one, add_comm, add_left_comm] using hz, z0⟩ #align nat.partrec.code.evaln_sound Nat.Partrec.Code.evaln_sound	Mathlib/Computability/PartrecCode.lean	729	795	theorem evaln_complete {c n x} : x ∈ eval c n ↔ ∃ k, x ∈ evaln k c n := by	refine ⟨fun h => ?_, fun ⟨k, h⟩ => evaln_sound h⟩ rsuffices ⟨k, h⟩ : ∃ k, x ∈ evaln (k + 1) c n · exact ⟨k + 1, h⟩ induction c generalizing n x with simp [eval, evaln, pure, PFun.pure, Seq.seq, Option.bind_eq_some] at h ⊢ \| pair cf cg hf hg => rcases h with ⟨x, hx, y, hy, rfl⟩ rcases hf hx with ⟨k₁, hk₁⟩; rcases hg hy with ⟨k₂, hk₂⟩ refine ⟨max k₁ k₂, ?_⟩ refine ⟨le_max_of_le_left <\| Nat.le_of_lt_succ <\| evaln_bound hk₁, _, evaln_mono (Nat.succ_le_succ <\| le_max_left _ _) hk₁, _, evaln_mono (Nat.succ_le_succ <\| le_max_right _ _) hk₂, rfl⟩ \| comp cf cg hf hg => rcases h with ⟨y, hy, hx⟩ rcases hg hy with ⟨k₁, hk₁⟩; rcases hf hx with ⟨k₂, hk₂⟩ refine ⟨max k₁ k₂, ?_⟩ exact ⟨le_max_of_le_left <\| Nat.le_of_lt_succ <\| evaln_bound hk₁, _, evaln_mono (Nat.succ_le_succ <\| le_max_left _ _) hk₁, evaln_mono (Nat.succ_le_succ <\| le_max_right _ _) hk₂⟩ \| prec cf cg hf hg => revert h generalize n.unpair.1 = n₁; generalize n.unpair.2 = n₂ induction' n₂ with m IH generalizing x n <;> simp [Option.bind_eq_some] · intro h rcases hf h with ⟨k, hk⟩ exact ⟨_, le_max_left _ _, evaln_mono (Nat.succ_le_succ <\| le_max_right _ _) hk⟩ · intro y hy hx rcases IH hy with ⟨k₁, nk₁, hk₁⟩ rcases hg hx with ⟨k₂, hk₂⟩ refine ⟨(max k₁ k₂).succ, Nat.le_succ_of_le <\| le_max_of_le_left <\| le_trans (le_max_left _ (Nat.pair n₁ m)) nk₁, y, evaln_mono (Nat.succ_le_succ <\| le_max_left _ _) ?_, evaln_mono (Nat.succ_le_succ <\| Nat.le_succ_of_le <\| le_max_right _ _) hk₂⟩ simp only [evaln.eq_8, bind, unpaired, unpair_pair, Option.mem_def, Option.bind_eq_some, Option.guard_eq_some', exists_and_left, exists_const] exact ⟨le_trans (le_max_right _ _) nk₁, hk₁⟩ \| rfind' cf hf => rcases h with ⟨y, ⟨hy₁, hy₂⟩, rfl⟩ suffices ∃ k, y + n.unpair.2 ∈ evaln (k + 1) (rfind' cf) (Nat.pair n.unpair.1 n.unpair.2) by simpa [evaln, Option.bind_eq_some] revert hy₁ hy₂ generalize n.unpair.2 = m intro hy₁ hy₂ induction' y with y IH generalizing m <;> simp [evaln, Option.bind_eq_some] · simp at hy₁ rcases hf hy₁ with ⟨k, hk⟩ exact ⟨_, Nat.le_of_lt_succ <\| evaln_bound hk, _, hk, by simp⟩ · rcases hy₂ (Nat.succ_pos _) with ⟨a, ha, a0⟩ rcases hf ha with ⟨k₁, hk₁⟩ rcases IH m.succ (by simpa [Nat.succ_eq_add_one, add_comm, add_left_comm] using hy₁) fun {i} hi => by simpa [Nat.succ_eq_add_one, add_comm, add_left_comm] using hy₂ (Nat.succ_lt_succ hi) with ⟨k₂, hk₂⟩ use (max k₁ k₂).succ rw [zero_add] at hk₁ use Nat.le_succ_of_le <\| le_max_of_le_left <\| Nat.le_of_lt_succ <\| evaln_bound hk₁ use a use evaln_mono (Nat.succ_le_succ <\| Nat.le_succ_of_le <\| le_max_left _ _) hk₁ simpa [Nat.succ_eq_add_one, a0, -max_eq_left, -max_eq_right, add_comm, add_left_comm] using evaln_mono (Nat.succ_le_succ <\| le_max_right _ _) hk₂ \| _ => exact ⟨⟨_, le_rfl⟩, h.symm⟩
import Mathlib.NumberTheory.LegendreSymbol.AddCharacter import Mathlib.NumberTheory.LegendreSymbol.ZModChar import Mathlib.Algebra.CharP.CharAndCard #align_import number_theory.legendre_symbol.gauss_sum from "leanprover-community/mathlib"@"e3f4be1fcb5376c4948d7f095bec45350bfb9d1a" universe u v open AddChar MulChar section gaussSum_frob variable {R : Type u} [CommRing R] [Fintype R] {R' : Type v} [CommRing R'] -- We assume that the target ring `R'` has prime characteristic `p`. variable (p : ℕ) [fp : Fact p.Prime] [hch : CharP R' p]	Mathlib/NumberTheory/GaussSum.lean	151	155	theorem gaussSum_frob (χ : MulChar R R') (ψ : AddChar R R') : gaussSum χ ψ ^ p = gaussSum (χ ^ p) (ψ ^ p) := by	rw [← frobenius_def, gaussSum, gaussSum, map_sum] simp_rw [pow_apply' χ fp.1.ne_zero, map_mul, frobenius_def] rfl

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