Split (1)

train · 21.9k rows

Context stringlengths 57 85k	file_name stringlengths 21 79	start int64 14 2.42k	end int64 18 2.43k	theorem stringlengths 25 2.71k	proof stringlengths 5 10.6k
import Mathlib.MeasureTheory.Integral.IntervalIntegral #align_import measure_theory.integral.layercake from "leanprover-community/mathlib"@"08a4542bec7242a5c60f179e4e49de8c0d677b1b" noncomputable section open scoped ENNReal MeasureTheory Topology open Set MeasureTheory Filter Measure namespace MeasureTheory section variable {α R : Type} [MeasurableSpace α] (μ : Measure α) [LinearOrder R] theorem countable_meas_le_ne_meas_lt (g : α → R) : {t : R \| μ {a : α \| t ≤ g a} ≠ μ {a : α \| t < g a}}.Countable := by -- the target set is contained in the set of points where the function `t ↦ μ {a : α \| t ≤ g a}` -- jumps down on the right of `t`. This jump set is countable for any function. let F : R → ℝ≥0∞ := fun t ↦ μ {a : α \| t ≤ g a} apply (countable_image_gt_image_Ioi F).mono intro t ht have : μ {a \| t < g a} < μ {a \| t ≤ g a} := lt_of_le_of_ne (measure_mono (fun a ha ↦ le_of_lt ha)) (Ne.symm ht) exact ⟨μ {a \| t < g a}, this, fun s hs ↦ measure_mono (fun a ha ↦ hs.trans_le ha)⟩ theorem meas_le_ae_eq_meas_lt {R : Type} [LinearOrder R] [MeasurableSpace R] (ν : Measure R) [NoAtoms ν] (g : α → R) : (fun t => μ {a : α \| t ≤ g a}) =ᵐ[ν] fun t => μ {a : α \| t < g a} := Set.Countable.measure_zero (countable_meas_le_ne_meas_lt μ g) _ end section Layercake variable {α : Type} [MeasurableSpace α] {f : α → ℝ} {g : ℝ → ℝ} {s : Set α} theorem lintegral_comp_eq_lintegral_meas_le_mul_of_measurable_of_sigmaFinite (μ : Measure α) [SigmaFinite μ] (f_nn : 0 ≤ f) (f_mble : Measurable f) (g_intble : ∀ t > 0, IntervalIntegrable g volume 0 t) (g_mble : Measurable g) (g_nn : ∀ t > 0, 0 ≤ g t) : ∫⁻ ω, ENNReal.ofReal (∫ t in (0)..f ω, g t) ∂μ = ∫⁻ t in Ioi 0, μ {a : α \| t ≤ f a} ENNReal.ofReal (g t) := by have g_intble' : ∀ t : ℝ, 0 ≤ t → IntervalIntegrable g volume 0 t := by intro t ht cases' eq_or_lt_of_le ht with h h · simp [← h] · exact g_intble t h have integrand_eq : ∀ ω, ENNReal.ofReal (∫ t in (0)..f ω, g t) = ∫⁻ t in Ioc 0 (f ω), ENNReal.ofReal (g t) := by intro ω have g_ae_nn : 0 ≤ᵐ[volume.restrict (Ioc 0 (f ω))] g := by filter_upwards [self_mem_ae_restrict (measurableSet_Ioc : MeasurableSet (Ioc 0 (f ω)))] with x hx using g_nn x hx.1 rw [← ofReal_integral_eq_lintegral_ofReal (g_intble' (f ω) (f_nn ω)).1 g_ae_nn] congr exact intervalIntegral.integral_of_le (f_nn ω) rw [lintegral_congr integrand_eq] simp_rw [← lintegral_indicator (fun t => ENNReal.ofReal (g t)) measurableSet_Ioc] -- Porting note: was part of `simp_rw` on the previous line, but didn't trigger. rw [← lintegral_indicator _ measurableSet_Ioi, lintegral_lintegral_swap] · apply congr_arg funext s have aux₁ : (fun x => (Ioc 0 (f x)).indicator (fun t : ℝ => ENNReal.ofReal (g t)) s) = fun x => ENNReal.ofReal (g s) * (Ioi (0 : ℝ)).indicator (fun _ => 1) s * (Ici s).indicator (fun _ : ℝ => (1 : ℝ≥0∞)) (f x) := by funext a by_cases h : s ∈ Ioc (0 : ℝ) (f a) · simp only [h, show s ∈ Ioi (0 : ℝ) from h.1, show f a ∈ Ici s from h.2, indicator_of_mem, mul_one] · have h_copy := h simp only [mem_Ioc, not_and, not_le] at h by_cases h' : 0 < s · simp only [h_copy, h h', indicator_of_not_mem, not_false_iff, mem_Ici, not_le, mul_zero] · have : s ∉ Ioi (0 : ℝ) := h' simp only [this, h', indicator_of_not_mem, not_false_iff, mul_zero, zero_mul, mem_Ioc, false_and_iff] simp_rw [aux₁] rw [lintegral_const_mul'] swap; · apply ENNReal.mul_ne_top ENNReal.ofReal_ne_top by_cases h : (0 : ℝ) < s <;> · simp [h] simp_rw [show (fun a => (Ici s).indicator (fun _ : ℝ => (1 : ℝ≥0∞)) (f a)) = fun a => {a : α \| s ≤ f a}.indicator (fun _ => 1) a by funext a; by_cases h : s ≤ f a <;> simp [h]] rw [lintegral_indicator₀] swap; · exact f_mble.nullMeasurable measurableSet_Ici rw [lintegral_one, Measure.restrict_apply MeasurableSet.univ, univ_inter, indicator_mul_left, mul_assoc, show (Ioi 0).indicator (fun _x : ℝ => (1 : ℝ≥0∞)) s * μ {a : α \| s ≤ f a} = (Ioi 0).indicator (fun _x : ℝ => 1 * μ {a : α \| s ≤ f a}) s by by_cases h : 0 < s <;> simp [h]] simp_rw [mul_comm _ (ENNReal.ofReal _), one_mul] rfl have aux₂ : (Function.uncurry fun (x : α) (y : ℝ) => (Ioc 0 (f x)).indicator (fun t : ℝ => ENNReal.ofReal (g t)) y) = {p : α × ℝ \| p.2 ∈ Ioc 0 (f p.1)}.indicator fun p => ENNReal.ofReal (g p.2) := by funext p cases p with \| mk p_fst p_snd => ?_ rw [Function.uncurry_apply_pair] by_cases h : p_snd ∈ Ioc 0 (f p_fst) · have h' : (p_fst, p_snd) ∈ {p : α × ℝ \| p.snd ∈ Ioc 0 (f p.fst)} := h rw [Set.indicator_of_mem h', Set.indicator_of_mem h] · have h' : (p_fst, p_snd) ∉ {p : α × ℝ \| p.snd ∈ Ioc 0 (f p.fst)} := h rw [Set.indicator_of_not_mem h', Set.indicator_of_not_mem h] rw [aux₂] have mble₀ : MeasurableSet {p : α × ℝ \| p.snd ∈ Ioc 0 (f p.fst)} := by simpa only [mem_univ, Pi.zero_apply, gt_iff_lt, not_lt, ge_iff_le, true_and] using measurableSet_region_between_oc measurable_zero f_mble MeasurableSet.univ exact (ENNReal.measurable_ofReal.comp (g_mble.comp measurable_snd)).aemeasurable.indicator₀ mble₀.nullMeasurableSet #align measure_theory.lintegral_comp_eq_lintegral_meas_le_mul_of_measurable MeasureTheory.lintegral_comp_eq_lintegral_meas_le_mul_of_measurable_of_sigmaFinite theorem lintegral_comp_eq_lintegral_meas_le_mul_of_measurable (μ : Measure α) (f_nn : 0 ≤ f) (f_mble : Measurable f) (g_intble : ∀ t > 0, IntervalIntegrable g volume 0 t) (g_mble : Measurable g) (g_nn : ∀ t > 0, 0 ≤ g t) : ∫⁻ ω, ENNReal.ofReal (∫ t in (0)..f ω, g t) ∂μ = ∫⁻ t in Ioi 0, μ {a : α \| t ≤ f a} * ENNReal.ofReal (g t) := by have f_nonneg : ∀ ω, 0 ≤ f ω := fun ω ↦ f_nn ω -- trivial case where `g` is ae zero. Then both integrals vanish. by_cases H1 : g =ᵐ[volume.restrict (Ioi (0 : ℝ))] 0 · have A : ∫⁻ ω, ENNReal.ofReal (∫ t in (0)..f ω, g t) ∂μ = 0 := by have : ∀ ω, ∫ t in (0)..f ω, g t = ∫ t in (0)..f ω, 0 := by intro ω simp_rw [intervalIntegral.integral_of_le (f_nonneg ω)] apply integral_congr_ae exact ae_restrict_of_ae_restrict_of_subset Ioc_subset_Ioi_self H1 simp [this] have B : ∫⁻ t in Ioi 0, μ {a : α \| t ≤ f a} * ENNReal.ofReal (g t) = 0 := by have : (fun t ↦ μ {a : α \| t ≤ f a} * ENNReal.ofReal (g t)) =ᵐ[volume.restrict (Ioi (0:ℝ))] 0 := by filter_upwards [H1] with t ht using by simp [ht] simp [lintegral_congr_ae this] rw [A, B] -- easy case where both sides are obviously infinite: for some `s`, one has -- `μ {a : α \| s < f a} = ∞` and moreover `g` is not ae zero on `[0, s]`. by_cases H2 : ∃ s > 0, 0 < ∫ t in (0)..s, g t ∧ μ {a : α \| s < f a} = ∞ · rcases H2 with ⟨s, s_pos, hs, h's⟩ rw [intervalIntegral.integral_of_le s_pos.le] at hs have A : ∫⁻ t in Ioi 0, μ {a : α \| t ≤ f a} * ENNReal.ofReal (g t) = ∞ := by rw [eq_top_iff] calc ∞ = ∫⁻ t in Ioc 0 s, ∞ * ENNReal.ofReal (g t) := by have I_pos : ∫⁻ (a : ℝ) in Ioc 0 s, ENNReal.ofReal (g a) ≠ 0 := by rw [← ofReal_integral_eq_lintegral_ofReal (g_intble s s_pos).1] · simpa only [not_lt, ge_iff_le, ne_eq, ENNReal.ofReal_eq_zero, not_le] using hs · filter_upwards [ae_restrict_mem measurableSet_Ioc] with t ht using g_nn _ ht.1 rw [lintegral_const_mul, ENNReal.top_mul I_pos] exact ENNReal.measurable_ofReal.comp g_mble _ ≤ ∫⁻ t in Ioc 0 s, μ {a : α \| t ≤ f a} * ENNReal.ofReal (g t) := by apply set_lintegral_mono' measurableSet_Ioc (fun x hx ↦ ?_) rw [← h's] gcongr exact fun a ha ↦ hx.2.trans (le_of_lt ha) _ ≤ ∫⁻ t in Ioi 0, μ {a : α \| t ≤ f a} * ENNReal.ofReal (g t) := lintegral_mono_set Ioc_subset_Ioi_self have B : ∫⁻ ω, ENNReal.ofReal (∫ t in (0)..f ω, g t) ∂μ = ∞ := by rw [eq_top_iff] calc ∞ = ∫⁻ _ in {a \| s < f a}, ENNReal.ofReal (∫ t in (0)..s, g t) ∂μ := by simp only [lintegral_const, MeasurableSet.univ, Measure.restrict_apply, univ_inter, h's, ne_eq, ENNReal.ofReal_eq_zero, not_le] rw [ENNReal.mul_top] simpa [intervalIntegral.integral_of_le s_pos.le] using hs _ ≤ ∫⁻ ω in {a \| s < f a}, ENNReal.ofReal (∫ t in (0)..f ω, g t) ∂μ := by apply set_lintegral_mono' (measurableSet_lt measurable_const f_mble) (fun a ha ↦ ?_) apply ENNReal.ofReal_le_ofReal apply intervalIntegral.integral_mono_interval le_rfl s_pos.le (le_of_lt ha) · filter_upwards [ae_restrict_mem measurableSet_Ioc] with t ht using g_nn _ ht.1 · exact g_intble _ (s_pos.trans ha) _ ≤ ∫⁻ ω, ENNReal.ofReal (∫ t in (0)..f ω, g t) ∂μ := set_lintegral_le_lintegral _ _ rw [A, B] push_neg at H2 have M_bdd : BddAbove {s : ℝ \| g =ᵐ[volume.restrict (Ioc (0 : ℝ) s)] 0} := by contrapose! H1 have : ∀ (n : ℕ), g =ᵐ[volume.restrict (Ioc (0 : ℝ) n)] 0 := by intro n rcases not_bddAbove_iff.1 H1 n with ⟨s, hs, ns⟩ exact ae_restrict_of_ae_restrict_of_subset (Ioc_subset_Ioc_right ns.le) hs have Hg : g =ᵐ[volume.restrict (⋃ (n : ℕ), (Ioc (0 : ℝ) n))] 0 := (ae_restrict_iUnion_iff _ _).2 this have : (⋃ (n : ℕ), (Ioc (0 : ℝ) n)) = Ioi 0 := iUnion_Ioc_eq_Ioi_self_iff.2 (fun x _ ↦ exists_nat_ge x) rwa [this] at Hg -- let `M` be the largest number such that `g` vanishes ae on `(0, M]`. let M : ℝ := sSup {s : ℝ \| g =ᵐ[volume.restrict (Ioc (0 : ℝ) s)] 0} have zero_mem : 0 ∈ {s : ℝ \| g =ᵐ[volume.restrict (Ioc (0 : ℝ) s)] 0} := by simpa using trivial have M_nonneg : 0 ≤ M := le_csSup M_bdd zero_mem -- Then the function `g` indeed vanishes ae on `(0, M]`. have hgM : g =ᵐ[volume.restrict (Ioc (0 : ℝ) M)] 0 := by rw [← restrict_Ioo_eq_restrict_Ioc] obtain ⟨u, -, uM, ulim⟩ : ∃ u, StrictMono u ∧ (∀ (n : ℕ), u n < M) ∧ Tendsto u atTop (𝓝 M) := exists_seq_strictMono_tendsto M have I : ∀ n, g =ᵐ[volume.restrict (Ioc (0 : ℝ) (u n))] 0 := by intro n obtain ⟨s, hs, uns⟩ : ∃ s, g =ᶠ[ae (Measure.restrict volume (Ioc 0 s))] 0 ∧ u n < s := exists_lt_of_lt_csSup (Set.nonempty_of_mem zero_mem) (uM n) exact ae_restrict_of_ae_restrict_of_subset (Ioc_subset_Ioc_right uns.le) hs have : g =ᵐ[volume.restrict (⋃ n, Ioc (0 : ℝ) (u n))] 0 := (ae_restrict_iUnion_iff _ _).2 I apply ae_restrict_of_ae_restrict_of_subset _ this rintro x ⟨x_pos, xM⟩ obtain ⟨n, hn⟩ : ∃ n, x < u n := ((tendsto_order.1 ulim).1 _ xM).exists exact mem_iUnion.2 ⟨n, ⟨x_pos, hn.le⟩⟩ -- Let `ν` be the restriction of `μ` to those points where `f a > M`. let ν := μ.restrict {a : α \| M < f a} -- This measure is sigma-finite (this is the whole point of the argument). have : SigmaFinite ν := by obtain ⟨u, -, uM, ulim⟩ : ∃ u, StrictAnti u ∧ (∀ (n : ℕ), M < u n) ∧ Tendsto u atTop (𝓝 M) := exists_seq_strictAnti_tendsto M let s : ν.FiniteSpanningSetsIn univ := { set := fun n ↦ {a \| f a ≤ M} ∪ {a \| u n < f a} set_mem := fun _ ↦ trivial finite := by intro n have I : ν {a \| f a ≤ M} = 0 := by rw [Measure.restrict_apply (measurableSet_le f_mble measurable_const)] convert measure_empty (μ := μ) rw [← disjoint_iff_inter_eq_empty] exact disjoint_left.mpr (fun a ha ↦ by simpa using ha) have J : μ {a \| u n < f a} < ∞ := by rw [lt_top_iff_ne_top] apply H2 _ (M_nonneg.trans_lt (uM n)) by_contra H3 rw [not_lt, intervalIntegral.integral_of_le (M_nonneg.trans (uM n).le)] at H3 have g_nn_ae : ∀ᵐ t ∂(volume.restrict (Ioc 0 (u n))), 0 ≤ g t := by filter_upwards [ae_restrict_mem measurableSet_Ioc] with s hs using g_nn _ hs.1 have Ig : ∫ (t : ℝ) in Ioc 0 (u n), g t = 0 := le_antisymm H3 (integral_nonneg_of_ae g_nn_ae) have J : ∀ᵐ t ∂(volume.restrict (Ioc 0 (u n))), g t = 0 := (integral_eq_zero_iff_of_nonneg_ae g_nn_ae (g_intble (u n) (M_nonneg.trans_lt (uM n))).1).1 Ig have : u n ≤ M := le_csSup M_bdd J exact lt_irrefl _ (this.trans_lt (uM n)) refine lt_of_le_of_lt (measure_union_le _ _) ?_ rw [I, zero_add] apply lt_of_le_of_lt _ J exact restrict_le_self _ spanning := by apply eq_univ_iff_forall.2 (fun a ↦ ?_) rcases le_or_lt (f a) M with ha\|ha · exact mem_iUnion.2 ⟨0, Or.inl ha⟩ · obtain ⟨n, hn⟩ : ∃ n, u n < f a := ((tendsto_order.1 ulim).2 _ ha).exists exact mem_iUnion.2 ⟨n, Or.inr hn⟩ } exact ⟨⟨s⟩⟩ -- the first integrals with respect to `μ` and to `ν` coincide, as points with `f a ≤ M` are -- weighted by zero as `g` vanishes there. have A : ∫⁻ ω, ENNReal.ofReal (∫ t in (0)..f ω, g t) ∂μ = ∫⁻ ω, ENNReal.ofReal (∫ t in (0)..f ω, g t) ∂ν := by have meas : MeasurableSet {a \| M < f a} := measurableSet_lt measurable_const f_mble have I : ∫⁻ ω in {a \| M < f a}ᶜ, ENNReal.ofReal (∫ t in (0).. f ω, g t) ∂μ = ∫⁻ _ in {a \| M < f a}ᶜ, 0 ∂μ := by apply set_lintegral_congr_fun meas.compl (eventually_of_forall (fun s hs ↦ ?_)) have : ∫ (t : ℝ) in (0)..f s, g t = ∫ (t : ℝ) in (0)..f s, 0 := by simp_rw [intervalIntegral.integral_of_le (f_nonneg s)] apply integral_congr_ae apply ae_mono (restrict_mono ?_ le_rfl) hgM apply Ioc_subset_Ioc_right simpa using hs simp [this] simp only [lintegral_const, zero_mul] at I rw [← lintegral_add_compl _ meas, I, add_zero] -- the second integrals with respect to `μ` and to `ν` coincide, as points with `f a ≤ M` do not -- contribute to either integral since the weight `g` vanishes. have B : ∫⁻ t in Ioi 0, μ {a : α \| t ≤ f a} * ENNReal.ofReal (g t) = ∫⁻ t in Ioi 0, ν {a : α \| t ≤ f a} * ENNReal.ofReal (g t) := by have B1 : ∫⁻ t in Ioc 0 M, μ {a : α \| t ≤ f a} * ENNReal.ofReal (g t) = ∫⁻ t in Ioc 0 M, ν {a : α \| t ≤ f a} * ENNReal.ofReal (g t) := by apply lintegral_congr_ae filter_upwards [hgM] with t ht simp [ht] have B2 : ∫⁻ t in Ioi M, μ {a : α \| t ≤ f a} * ENNReal.ofReal (g t) = ∫⁻ t in Ioi M, ν {a : α \| t ≤ f a} * ENNReal.ofReal (g t) := by apply set_lintegral_congr_fun measurableSet_Ioi (eventually_of_forall (fun t ht ↦ ?_)) rw [Measure.restrict_apply (measurableSet_le measurable_const f_mble)] congr 3 exact (inter_eq_left.2 (fun a ha ↦ (mem_Ioi.1 ht).trans_le ha)).symm have I : Ioi (0 : ℝ) = Ioc (0 : ℝ) M ∪ Ioi M := (Ioc_union_Ioi_eq_Ioi M_nonneg).symm have J : Disjoint (Ioc 0 M) (Ioi M) := Ioc_disjoint_Ioi le_rfl rw [I, lintegral_union measurableSet_Ioi J, lintegral_union measurableSet_Ioi J, B1, B2] -- therefore, we may replace the integrals wrt `μ` with integrals wrt `ν`, and apply the -- result for sigma-finite measures. rw [A, B] exact lintegral_comp_eq_lintegral_meas_le_mul_of_measurable_of_sigmaFinite ν f_nn f_mble g_intble g_mble g_nn	Mathlib/MeasureTheory/Integral/Layercake.lean	395	437	theorem lintegral_comp_eq_lintegral_meas_le_mul (μ : Measure α) (f_nn : 0 ≤ᵐ[μ] f) (f_mble : AEMeasurable f μ) (g_intble : ∀ t > 0, IntervalIntegrable g volume 0 t) (g_nn : ∀ᵐ t ∂volume.restrict (Ioi 0), 0 ≤ g t) : ∫⁻ ω, ENNReal.ofReal (∫ t in (0)..f ω, g t) ∂μ = ∫⁻ t in Ioi 0, μ {a : α \| t ≤ f a} * ENNReal.ofReal (g t) := by	obtain ⟨G, G_mble, G_nn, g_eq_G⟩ : ∃ G : ℝ → ℝ, Measurable G ∧ 0 ≤ G ∧ g =ᵐ[volume.restrict (Ioi 0)] G := by refine AEMeasurable.exists_measurable_nonneg ?_ g_nn exact aemeasurable_Ioi_of_forall_Ioc fun t ht => (g_intble t ht).1.1.aemeasurable have g_eq_G_on : ∀ t, g =ᵐ[volume.restrict (Ioc 0 t)] G := fun t => ae_mono (Measure.restrict_mono Ioc_subset_Ioi_self le_rfl) g_eq_G have G_intble : ∀ t > 0, IntervalIntegrable G volume 0 t := by refine fun t t_pos => ⟨(g_intble t t_pos).1.congr_fun_ae (g_eq_G_on t), ?_⟩ rw [Ioc_eq_empty_of_le t_pos.lt.le] exact integrableOn_empty obtain ⟨F, F_mble, F_nn, f_eq_F⟩ : ∃ F : α → ℝ, Measurable F ∧ 0 ≤ F ∧ f =ᵐ[μ] F := by refine ⟨fun ω ↦ max (f_mble.mk f ω) 0, f_mble.measurable_mk.max measurable_const, fun ω ↦ le_max_right _ _, ?_⟩ filter_upwards [f_mble.ae_eq_mk, f_nn] with ω hω h'ω rw [← hω] exact (max_eq_left h'ω).symm have eq₁ : ∫⁻ t in Ioi 0, μ {a : α \| t ≤ f a} * ENNReal.ofReal (g t) = ∫⁻ t in Ioi 0, μ {a : α \| t ≤ F a} * ENNReal.ofReal (G t) := by apply lintegral_congr_ae filter_upwards [g_eq_G] with t ht rw [ht] congr 1 apply measure_congr filter_upwards [f_eq_F] with a ha using by simp [setOf, ha] have eq₂ : ∀ᵐ ω ∂μ, ENNReal.ofReal (∫ t in (0)..f ω, g t) = ENNReal.ofReal (∫ t in (0)..F ω, G t) := by filter_upwards [f_eq_F] with ω fω_nn rw [fω_nn] congr 1 refine intervalIntegral.integral_congr_ae ?_ have fω_nn : 0 ≤ F ω := F_nn ω rw [uIoc_of_le fω_nn, ← ae_restrict_iff' (measurableSet_Ioc : MeasurableSet (Ioc (0 : ℝ) (F ω)))] exact g_eq_G_on (F ω) simp_rw [lintegral_congr_ae eq₂, eq₁] exact lintegral_comp_eq_lintegral_meas_le_mul_of_measurable μ F_nn F_mble G_intble G_mble (fun t _ => G_nn t)
import Mathlib.Algebra.GroupWithZero.Divisibility import Mathlib.Algebra.Order.Ring.Nat import Mathlib.Tactic.NthRewrite #align_import data.nat.gcd.basic from "leanprover-community/mathlib"@"e8638a0fcaf73e4500469f368ef9494e495099b3" namespace Nat theorem gcd_greatest {a b d : ℕ} (hda : d ∣ a) (hdb : d ∣ b) (hd : ∀ e : ℕ, e ∣ a → e ∣ b → e ∣ d) : d = a.gcd b := (dvd_antisymm (hd _ (gcd_dvd_left a b) (gcd_dvd_right a b)) (dvd_gcd hda hdb)).symm #align nat.gcd_greatest Nat.gcd_greatest @[simp] theorem gcd_add_mul_right_right (m n k : ℕ) : gcd m (n + k * m) = gcd m n := by simp [gcd_rec m (n + k * m), gcd_rec m n] #align nat.gcd_add_mul_right_right Nat.gcd_add_mul_right_right @[simp] theorem gcd_add_mul_left_right (m n k : ℕ) : gcd m (n + m * k) = gcd m n := by simp [gcd_rec m (n + m * k), gcd_rec m n] #align nat.gcd_add_mul_left_right Nat.gcd_add_mul_left_right @[simp] theorem gcd_mul_right_add_right (m n k : ℕ) : gcd m (k * m + n) = gcd m n := by simp [add_comm _ n] #align nat.gcd_mul_right_add_right Nat.gcd_mul_right_add_right @[simp] theorem gcd_mul_left_add_right (m n k : ℕ) : gcd m (m * k + n) = gcd m n := by simp [add_comm _ n] #align nat.gcd_mul_left_add_right Nat.gcd_mul_left_add_right @[simp] theorem gcd_add_mul_right_left (m n k : ℕ) : gcd (m + k * n) n = gcd m n := by rw [gcd_comm, gcd_add_mul_right_right, gcd_comm] #align nat.gcd_add_mul_right_left Nat.gcd_add_mul_right_left @[simp] theorem gcd_add_mul_left_left (m n k : ℕ) : gcd (m + n * k) n = gcd m n := by rw [gcd_comm, gcd_add_mul_left_right, gcd_comm] #align nat.gcd_add_mul_left_left Nat.gcd_add_mul_left_left @[simp] theorem gcd_mul_right_add_left (m n k : ℕ) : gcd (k * n + m) n = gcd m n := by rw [gcd_comm, gcd_mul_right_add_right, gcd_comm] #align nat.gcd_mul_right_add_left Nat.gcd_mul_right_add_left @[simp] theorem gcd_mul_left_add_left (m n k : ℕ) : gcd (n * k + m) n = gcd m n := by rw [gcd_comm, gcd_mul_left_add_right, gcd_comm] #align nat.gcd_mul_left_add_left Nat.gcd_mul_left_add_left @[simp] theorem gcd_add_self_right (m n : ℕ) : gcd m (n + m) = gcd m n := Eq.trans (by rw [one_mul]) (gcd_add_mul_right_right m n 1) #align nat.gcd_add_self_right Nat.gcd_add_self_right @[simp] theorem gcd_add_self_left (m n : ℕ) : gcd (m + n) n = gcd m n := by rw [gcd_comm, gcd_add_self_right, gcd_comm] #align nat.gcd_add_self_left Nat.gcd_add_self_left @[simp] theorem gcd_self_add_left (m n : ℕ) : gcd (m + n) m = gcd n m := by rw [add_comm, gcd_add_self_left] #align nat.gcd_self_add_left Nat.gcd_self_add_left @[simp] theorem gcd_self_add_right (m n : ℕ) : gcd m (m + n) = gcd m n := by rw [add_comm, gcd_add_self_right] #align nat.gcd_self_add_right Nat.gcd_self_add_right @[simp] theorem gcd_sub_self_left {m n : ℕ} (h : m ≤ n) : gcd (n - m) m = gcd n m := by calc gcd (n - m) m = gcd (n - m + m) m := by rw [← gcd_add_self_left (n - m) m] _ = gcd n m := by rw [Nat.sub_add_cancel h] @[simp] theorem gcd_sub_self_right {m n : ℕ} (h : m ≤ n) : gcd m (n - m) = gcd m n := by rw [gcd_comm, gcd_sub_self_left h, gcd_comm] @[simp] theorem gcd_self_sub_left {m n : ℕ} (h : m ≤ n) : gcd (n - m) n = gcd m n := by have := Nat.sub_add_cancel h rw [gcd_comm m n, ← this, gcd_add_self_left (n - m) m] have : gcd (n - m) n = gcd (n - m) m := by nth_rw 2 [← Nat.add_sub_cancel' h] rw [gcd_add_self_right, gcd_comm] convert this @[simp] theorem gcd_self_sub_right {m n : ℕ} (h : m ≤ n) : gcd n (n - m) = gcd n m := by rw [gcd_comm, gcd_self_sub_left h, gcd_comm] theorem lcm_dvd_mul (m n : ℕ) : lcm m n ∣ m * n := lcm_dvd (dvd_mul_right _ _) (dvd_mul_left _ _) #align nat.lcm_dvd_mul Nat.lcm_dvd_mul theorem lcm_dvd_iff {m n k : ℕ} : lcm m n ∣ k ↔ m ∣ k ∧ n ∣ k := ⟨fun h => ⟨(dvd_lcm_left _ _).trans h, (dvd_lcm_right _ _).trans h⟩, and_imp.2 lcm_dvd⟩ #align nat.lcm_dvd_iff Nat.lcm_dvd_iff theorem lcm_pos {m n : ℕ} : 0 < m → 0 < n → 0 < m.lcm n := by simp_rw [pos_iff_ne_zero] exact lcm_ne_zero #align nat.lcm_pos Nat.lcm_pos theorem lcm_mul_left {m n k : ℕ} : (m * n).lcm (m * k) = m * n.lcm k := by apply dvd_antisymm · exact lcm_dvd (mul_dvd_mul_left m (dvd_lcm_left n k)) (mul_dvd_mul_left m (dvd_lcm_right n k)) · have h : m ∣ lcm (m * n) (m * k) := (dvd_mul_right m n).trans (dvd_lcm_left (m * n) (m * k)) rw [← dvd_div_iff h, lcm_dvd_iff, dvd_div_iff h, dvd_div_iff h, ← lcm_dvd_iff] theorem lcm_mul_right {m n k : ℕ} : (m * n).lcm (k * n) = m.lcm k * n := by rw [mul_comm, mul_comm k n, lcm_mul_left, mul_comm] instance (m n : ℕ) : Decidable (Coprime m n) := inferInstanceAs (Decidable (gcd m n = 1)) theorem Coprime.lcm_eq_mul {m n : ℕ} (h : Coprime m n) : lcm m n = m * n := by rw [← one_mul (lcm m n), ← h.gcd_eq_one, gcd_mul_lcm] #align nat.coprime.lcm_eq_mul Nat.Coprime.lcm_eq_mul theorem Coprime.symmetric : Symmetric Coprime := fun _ _ => Coprime.symm #align nat.coprime.symmetric Nat.Coprime.symmetric theorem Coprime.dvd_mul_right {m n k : ℕ} (H : Coprime k n) : k ∣ m * n ↔ k ∣ m := ⟨H.dvd_of_dvd_mul_right, fun h => dvd_mul_of_dvd_left h n⟩ #align nat.coprime.dvd_mul_right Nat.Coprime.dvd_mul_right theorem Coprime.dvd_mul_left {m n k : ℕ} (H : Coprime k m) : k ∣ m * n ↔ k ∣ n := ⟨H.dvd_of_dvd_mul_left, fun h => dvd_mul_of_dvd_right h m⟩ #align nat.coprime.dvd_mul_left Nat.Coprime.dvd_mul_left @[simp] theorem coprime_add_self_right {m n : ℕ} : Coprime m (n + m) ↔ Coprime m n := by rw [Coprime, Coprime, gcd_add_self_right] #align nat.coprime_add_self_right Nat.coprime_add_self_right @[simp] theorem coprime_self_add_right {m n : ℕ} : Coprime m (m + n) ↔ Coprime m n := by rw [add_comm, coprime_add_self_right] #align nat.coprime_self_add_right Nat.coprime_self_add_right @[simp] theorem coprime_add_self_left {m n : ℕ} : Coprime (m + n) n ↔ Coprime m n := by rw [Coprime, Coprime, gcd_add_self_left] #align nat.coprime_add_self_left Nat.coprime_add_self_left @[simp] theorem coprime_self_add_left {m n : ℕ} : Coprime (m + n) m ↔ Coprime n m := by rw [Coprime, Coprime, gcd_self_add_left] #align nat.coprime_self_add_left Nat.coprime_self_add_left @[simp] theorem coprime_add_mul_right_right (m n k : ℕ) : Coprime m (n + k * m) ↔ Coprime m n := by rw [Coprime, Coprime, gcd_add_mul_right_right] #align nat.coprime_add_mul_right_right Nat.coprime_add_mul_right_right @[simp] theorem coprime_add_mul_left_right (m n k : ℕ) : Coprime m (n + m * k) ↔ Coprime m n := by rw [Coprime, Coprime, gcd_add_mul_left_right] #align nat.coprime_add_mul_left_right Nat.coprime_add_mul_left_right @[simp] theorem coprime_mul_right_add_right (m n k : ℕ) : Coprime m (k * m + n) ↔ Coprime m n := by rw [Coprime, Coprime, gcd_mul_right_add_right] #align nat.coprime_mul_right_add_right Nat.coprime_mul_right_add_right @[simp] theorem coprime_mul_left_add_right (m n k : ℕ) : Coprime m (m * k + n) ↔ Coprime m n := by rw [Coprime, Coprime, gcd_mul_left_add_right] #align nat.coprime_mul_left_add_right Nat.coprime_mul_left_add_right @[simp] theorem coprime_add_mul_right_left (m n k : ℕ) : Coprime (m + k * n) n ↔ Coprime m n := by rw [Coprime, Coprime, gcd_add_mul_right_left] #align nat.coprime_add_mul_right_left Nat.coprime_add_mul_right_left @[simp] theorem coprime_add_mul_left_left (m n k : ℕ) : Coprime (m + n * k) n ↔ Coprime m n := by rw [Coprime, Coprime, gcd_add_mul_left_left] #align nat.coprime_add_mul_left_left Nat.coprime_add_mul_left_left @[simp] theorem coprime_mul_right_add_left (m n k : ℕ) : Coprime (k * n + m) n ↔ Coprime m n := by rw [Coprime, Coprime, gcd_mul_right_add_left] #align nat.coprime_mul_right_add_left Nat.coprime_mul_right_add_left @[simp] theorem coprime_mul_left_add_left (m n k : ℕ) : Coprime (n * k + m) n ↔ Coprime m n := by rw [Coprime, Coprime, gcd_mul_left_add_left] #align nat.coprime_mul_left_add_left Nat.coprime_mul_left_add_left @[simp] theorem coprime_sub_self_left {m n : ℕ} (h : m ≤ n) : Coprime (n - m) m ↔ Coprime n m := by rw [Coprime, Coprime, gcd_sub_self_left h] @[simp] theorem coprime_sub_self_right {m n : ℕ} (h : m ≤ n) : Coprime m (n - m) ↔ Coprime m n := by rw [Coprime, Coprime, gcd_sub_self_right h] @[simp] theorem coprime_self_sub_left {m n : ℕ} (h : m ≤ n) : Coprime (n - m) n ↔ Coprime m n := by rw [Coprime, Coprime, gcd_self_sub_left h] @[simp] theorem coprime_self_sub_right {m n : ℕ} (h : m ≤ n) : Coprime n (n - m) ↔ Coprime n m := by rw [Coprime, Coprime, gcd_self_sub_right h] @[simp] theorem coprime_pow_left_iff {n : ℕ} (hn : 0 < n) (a b : ℕ) : Nat.Coprime (a ^ n) b ↔ Nat.Coprime a b := by obtain ⟨n, rfl⟩ := exists_eq_succ_of_ne_zero hn.ne' rw [Nat.pow_succ, Nat.coprime_mul_iff_left] exact ⟨And.right, fun hab => ⟨hab.pow_left _, hab⟩⟩ #align nat.coprime_pow_left_iff Nat.coprime_pow_left_iff @[simp] theorem coprime_pow_right_iff {n : ℕ} (hn : 0 < n) (a b : ℕ) : Nat.Coprime a (b ^ n) ↔ Nat.Coprime a b := by rw [Nat.coprime_comm, coprime_pow_left_iff hn, Nat.coprime_comm] #align nat.coprime_pow_right_iff Nat.coprime_pow_right_iff theorem not_coprime_zero_zero : ¬Coprime 0 0 := by simp #align nat.not_coprime_zero_zero Nat.not_coprime_zero_zero theorem coprime_one_left_iff (n : ℕ) : Coprime 1 n ↔ True := by simp [Coprime] #align nat.coprime_one_left_iff Nat.coprime_one_left_iff theorem coprime_one_right_iff (n : ℕ) : Coprime n 1 ↔ True := by simp [Coprime] #align nat.coprime_one_right_iff Nat.coprime_one_right_iff theorem gcd_mul_of_coprime_of_dvd {a b c : ℕ} (hac : Coprime a c) (b_dvd_c : b ∣ c) : gcd (a * b) c = b := by rcases exists_eq_mul_left_of_dvd b_dvd_c with ⟨d, rfl⟩ rw [gcd_mul_right] convert one_mul b exact Coprime.coprime_mul_right_right hac #align nat.gcd_mul_of_coprime_of_dvd Nat.gcd_mul_of_coprime_of_dvd theorem Coprime.eq_of_mul_eq_zero {m n : ℕ} (h : m.Coprime n) (hmn : m * n = 0) : m = 0 ∧ n = 1 ∨ m = 1 ∧ n = 0 := (Nat.eq_zero_of_mul_eq_zero hmn).imp (fun hm => ⟨hm, n.coprime_zero_left.mp <\| hm ▸ h⟩) fun hn => let eq := hn ▸ h.symm ⟨m.coprime_zero_left.mp <\| eq, hn⟩ #align nat.coprime.eq_of_mul_eq_zero Nat.Coprime.eq_of_mul_eq_zero def prodDvdAndDvdOfDvdProd {m n k : ℕ} (H : k ∣ m * n) : { d : { m' // m' ∣ m } × { n' // n' ∣ n } // k = d.1 * d.2 } := by cases h0 : gcd k m with \| zero => obtain rfl : k = 0 := eq_zero_of_gcd_eq_zero_left h0 obtain rfl : m = 0 := eq_zero_of_gcd_eq_zero_right h0 exact ⟨⟨⟨0, dvd_refl 0⟩, ⟨n, dvd_refl n⟩⟩, (zero_mul n).symm⟩ \| succ tmp => have hpos : 0 < gcd k m := h0.symm ▸ Nat.zero_lt_succ _; clear h0 tmp have hd : gcd k m * (k / gcd k m) = k := Nat.mul_div_cancel' (gcd_dvd_left k m) refine ⟨⟨⟨gcd k m, gcd_dvd_right k m⟩, ⟨k / gcd k m, ?_⟩⟩, hd.symm⟩ apply Nat.dvd_of_mul_dvd_mul_left hpos rw [hd, ← gcd_mul_right] exact dvd_gcd (dvd_mul_right _ _) H #align nat.prod_dvd_and_dvd_of_dvd_prod Nat.prodDvdAndDvdOfDvdProd	Mathlib/Data/Nat/GCD/Basic.lean	299	305	theorem dvd_mul {x m n : ℕ} : x ∣ m * n ↔ ∃ y z, y ∣ m ∧ z ∣ n ∧ y * z = x := by	constructor · intro h obtain ⟨⟨⟨y, hy⟩, ⟨z, hz⟩⟩, rfl⟩ := prod_dvd_and_dvd_of_dvd_prod h exact ⟨y, z, hy, hz, rfl⟩ · rintro ⟨y, z, hy, hz, rfl⟩ exact mul_dvd_mul hy hz
import Mathlib.Topology.Algebra.Module.WeakDual import Mathlib.MeasureTheory.Integral.BoundedContinuousFunction import Mathlib.MeasureTheory.Measure.HasOuterApproxClosed #align_import measure_theory.measure.finite_measure from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" noncomputable section open MeasureTheory open Set open Filter open BoundedContinuousFunction open scoped Topology ENNReal NNReal BoundedContinuousFunction namespace MeasureTheory namespace FiniteMeasure section FiniteMeasure variable {Ω : Type} [MeasurableSpace Ω] def _root_.MeasureTheory.FiniteMeasure (Ω : Type) [MeasurableSpace Ω] : Type _ := { μ : Measure Ω // IsFiniteMeasure μ } #align measure_theory.finite_measure MeasureTheory.FiniteMeasure -- Porting note: as with other subtype synonyms (e.g., `ℝ≥0`, we need a new function for the -- coercion instead of relying on `Subtype.val`. @[coe] def toMeasure : FiniteMeasure Ω → Measure Ω := Subtype.val instance instCoe : Coe (FiniteMeasure Ω) (MeasureTheory.Measure Ω) where coe := toMeasure instance isFiniteMeasure (μ : FiniteMeasure Ω) : IsFiniteMeasure (μ : Measure Ω) := μ.prop #align measure_theory.finite_measure.is_finite_measure MeasureTheory.FiniteMeasure.isFiniteMeasure @[simp] theorem val_eq_toMeasure (ν : FiniteMeasure Ω) : ν.val = (ν : Measure Ω) := rfl #align measure_theory.finite_measure.val_eq_to_measure MeasureTheory.FiniteMeasure.val_eq_toMeasure theorem toMeasure_injective : Function.Injective ((↑) : FiniteMeasure Ω → Measure Ω) := Subtype.coe_injective #align measure_theory.finite_measure.coe_injective MeasureTheory.FiniteMeasure.toMeasure_injective instance instFunLike : FunLike (FiniteMeasure Ω) (Set Ω) ℝ≥0 where coe μ s := ((μ : Measure Ω) s).toNNReal coe_injective' μ ν h := toMeasure_injective $ Measure.ext fun s _ ↦ by simpa [ENNReal.toNNReal_eq_toNNReal_iff, measure_ne_top] using congr_fun h s lemma coeFn_def (μ : FiniteMeasure Ω) : μ = fun s ↦ ((μ : Measure Ω) s).toNNReal := rfl #align measure_theory.finite_measure.coe_fn_eq_to_nnreal_coe_fn_to_measure MeasureTheory.FiniteMeasure.coeFn_def lemma coeFn_mk (μ : Measure Ω) (hμ) : DFunLike.coe (F := FiniteMeasure Ω) ⟨μ, hμ⟩ = fun s ↦ (μ s).toNNReal := rfl @[simp, norm_cast] lemma mk_apply (μ : Measure Ω) (hμ) (s : Set Ω) : DFunLike.coe (F := FiniteMeasure Ω) ⟨μ, hμ⟩ s = (μ s).toNNReal := rfl @[simp] theorem ennreal_coeFn_eq_coeFn_toMeasure (ν : FiniteMeasure Ω) (s : Set Ω) : (ν s : ℝ≥0∞) = (ν : Measure Ω) s := ENNReal.coe_toNNReal (measure_lt_top (↑ν) s).ne #align measure_theory.finite_measure.ennreal_coe_fn_eq_coe_fn_to_measure MeasureTheory.FiniteMeasure.ennreal_coeFn_eq_coeFn_toMeasure theorem apply_mono (μ : FiniteMeasure Ω) {s₁ s₂ : Set Ω} (h : s₁ ⊆ s₂) : μ s₁ ≤ μ s₂ := by change ((μ : Measure Ω) s₁).toNNReal ≤ ((μ : Measure Ω) s₂).toNNReal have key : (μ : Measure Ω) s₁ ≤ (μ : Measure Ω) s₂ := (μ : Measure Ω).mono h apply (ENNReal.toNNReal_le_toNNReal (measure_ne_top _ s₁) (measure_ne_top _ s₂)).mpr key #align measure_theory.finite_measure.apply_mono MeasureTheory.FiniteMeasure.apply_mono def mass (μ : FiniteMeasure Ω) : ℝ≥0 := μ univ #align measure_theory.finite_measure.mass MeasureTheory.FiniteMeasure.mass @[simp] theorem apply_le_mass (μ : FiniteMeasure Ω) (s : Set Ω) : μ s ≤ μ.mass := by simpa using apply_mono μ (subset_univ s) @[simp] theorem ennreal_mass {μ : FiniteMeasure Ω} : (μ.mass : ℝ≥0∞) = (μ : Measure Ω) univ := ennreal_coeFn_eq_coeFn_toMeasure μ Set.univ #align measure_theory.finite_measure.ennreal_mass MeasureTheory.FiniteMeasure.ennreal_mass instance instZero : Zero (FiniteMeasure Ω) where zero := ⟨0, MeasureTheory.isFiniteMeasureZero⟩ #align measure_theory.finite_measure.has_zero MeasureTheory.FiniteMeasure.instZero @[simp, norm_cast] lemma coeFn_zero : ⇑(0 : FiniteMeasure Ω) = 0 := rfl #align measure_theory.finite_measure.coe_fn_zero MeasureTheory.FiniteMeasure.coeFn_zero @[simp] theorem zero_mass : (0 : FiniteMeasure Ω).mass = 0 := rfl #align measure_theory.finite_measure.zero.mass MeasureTheory.FiniteMeasure.zero_mass @[simp] theorem mass_zero_iff (μ : FiniteMeasure Ω) : μ.mass = 0 ↔ μ = 0 := by refine ⟨fun μ_mass => ?_, fun hμ => by simp only [hμ, zero_mass]⟩ apply toMeasure_injective apply Measure.measure_univ_eq_zero.mp rwa [← ennreal_mass, ENNReal.coe_eq_zero] #align measure_theory.finite_measure.mass_zero_iff MeasureTheory.FiniteMeasure.mass_zero_iff theorem mass_nonzero_iff (μ : FiniteMeasure Ω) : μ.mass ≠ 0 ↔ μ ≠ 0 := by rw [not_iff_not] exact FiniteMeasure.mass_zero_iff μ #align measure_theory.finite_measure.mass_nonzero_iff MeasureTheory.FiniteMeasure.mass_nonzero_iff @[ext] theorem eq_of_forall_toMeasure_apply_eq (μ ν : FiniteMeasure Ω) (h : ∀ s : Set Ω, MeasurableSet s → (μ : Measure Ω) s = (ν : Measure Ω) s) : μ = ν := by apply Subtype.ext ext1 s s_mble exact h s s_mble #align measure_theory.finite_measure.eq_of_forall_measure_apply_eq MeasureTheory.FiniteMeasure.eq_of_forall_toMeasure_apply_eq theorem eq_of_forall_apply_eq (μ ν : FiniteMeasure Ω) (h : ∀ s : Set Ω, MeasurableSet s → μ s = ν s) : μ = ν := by ext1 s s_mble simpa [ennreal_coeFn_eq_coeFn_toMeasure] using congr_arg ((↑) : ℝ≥0 → ℝ≥0∞) (h s s_mble) #align measure_theory.finite_measure.eq_of_forall_apply_eq MeasureTheory.FiniteMeasure.eq_of_forall_apply_eq instance instInhabited : Inhabited (FiniteMeasure Ω) := ⟨0⟩ instance instAdd : Add (FiniteMeasure Ω) where add μ ν := ⟨μ + ν, MeasureTheory.isFiniteMeasureAdd⟩ variable {R : Type} [SMul R ℝ≥0] [SMul R ℝ≥0∞] [IsScalarTower R ℝ≥0 ℝ≥0∞] [IsScalarTower R ℝ≥0∞ ℝ≥0∞] instance instSMul : SMul R (FiniteMeasure Ω) where smul (c : R) μ := ⟨c • (μ : Measure Ω), MeasureTheory.isFiniteMeasureSMulOfNNRealTower⟩ @[simp, norm_cast] theorem toMeasure_zero : ((↑) : FiniteMeasure Ω → Measure Ω) 0 = 0 := rfl #align measure_theory.finite_measure.coe_zero MeasureTheory.FiniteMeasure.toMeasure_zero -- Porting note: with `simp` here the `coeFn` lemmas below fall prey to `simpNF`: the LHS simplifies @[norm_cast] theorem toMeasure_add (μ ν : FiniteMeasure Ω) : ↑(μ + ν) = (↑μ + ↑ν : Measure Ω) := rfl #align measure_theory.finite_measure.coe_add MeasureTheory.FiniteMeasure.toMeasure_add @[simp, norm_cast] theorem toMeasure_smul (c : R) (μ : FiniteMeasure Ω) : ↑(c • μ) = c • (μ : Measure Ω) := rfl #align measure_theory.finite_measure.coe_smul MeasureTheory.FiniteMeasure.toMeasure_smul @[simp, norm_cast] theorem coeFn_add (μ ν : FiniteMeasure Ω) : (⇑(μ + ν) : Set Ω → ℝ≥0) = (⇑μ + ⇑ν : Set Ω → ℝ≥0) := by funext simp only [Pi.add_apply, ← ENNReal.coe_inj, ne_eq, ennreal_coeFn_eq_coeFn_toMeasure, ENNReal.coe_add] norm_cast #align measure_theory.finite_measure.coe_fn_add MeasureTheory.FiniteMeasure.coeFn_add @[simp, norm_cast] theorem coeFn_smul [IsScalarTower R ℝ≥0 ℝ≥0] (c : R) (μ : FiniteMeasure Ω) : (⇑(c • μ) : Set Ω → ℝ≥0) = c • (⇑μ : Set Ω → ℝ≥0) := by funext; simp [← ENNReal.coe_inj, ENNReal.coe_smul] #align measure_theory.finite_measure.coe_fn_smul MeasureTheory.FiniteMeasure.coeFn_smul instance instAddCommMonoid : AddCommMonoid (FiniteMeasure Ω) := toMeasure_injective.addCommMonoid (↑) toMeasure_zero toMeasure_add fun _ _ => toMeasure_smul _ _ @[simps] def toMeasureAddMonoidHom : FiniteMeasure Ω →+ Measure Ω where toFun := (↑) map_zero' := toMeasure_zero map_add' := toMeasure_add #align measure_theory.finite_measure.coe_add_monoid_hom MeasureTheory.FiniteMeasure.toMeasureAddMonoidHom instance {Ω : Type} [MeasurableSpace Ω] : Module ℝ≥0 (FiniteMeasure Ω) := Function.Injective.module _ toMeasureAddMonoidHom toMeasure_injective toMeasure_smul @[simp] theorem smul_apply [IsScalarTower R ℝ≥0 ℝ≥0] (c : R) (μ : FiniteMeasure Ω) (s : Set Ω) : (c • μ) s = c • μ s := by rw [coeFn_smul, Pi.smul_apply] #align measure_theory.finite_measure.coe_fn_smul_apply MeasureTheory.FiniteMeasure.smul_apply def restrict (μ : FiniteMeasure Ω) (A : Set Ω) : FiniteMeasure Ω where val := (μ : Measure Ω).restrict A property := MeasureTheory.isFiniteMeasureRestrict (μ : Measure Ω) A #align measure_theory.finite_measure.restrict MeasureTheory.FiniteMeasure.restrict theorem restrict_measure_eq (μ : FiniteMeasure Ω) (A : Set Ω) : (μ.restrict A : Measure Ω) = (μ : Measure Ω).restrict A := rfl #align measure_theory.finite_measure.restrict_measure_eq MeasureTheory.FiniteMeasure.restrict_measure_eq theorem restrict_apply_measure (μ : FiniteMeasure Ω) (A : Set Ω) {s : Set Ω} (s_mble : MeasurableSet s) : (μ.restrict A : Measure Ω) s = (μ : Measure Ω) (s ∩ A) := Measure.restrict_apply s_mble #align measure_theory.finite_measure.restrict_apply_measure MeasureTheory.FiniteMeasure.restrict_apply_measure theorem restrict_apply (μ : FiniteMeasure Ω) (A : Set Ω) {s : Set Ω} (s_mble : MeasurableSet s) : (μ.restrict A) s = μ (s ∩ A) := by apply congr_arg ENNReal.toNNReal exact Measure.restrict_apply s_mble #align measure_theory.finite_measure.restrict_apply MeasureTheory.FiniteMeasure.restrict_apply theorem restrict_mass (μ : FiniteMeasure Ω) (A : Set Ω) : (μ.restrict A).mass = μ A := by simp only [mass, restrict_apply μ A MeasurableSet.univ, univ_inter] #align measure_theory.finite_measure.restrict_mass MeasureTheory.FiniteMeasure.restrict_mass theorem restrict_eq_zero_iff (μ : FiniteMeasure Ω) (A : Set Ω) : μ.restrict A = 0 ↔ μ A = 0 := by rw [← mass_zero_iff, restrict_mass] #align measure_theory.finite_measure.restrict_eq_zero_iff MeasureTheory.FiniteMeasure.restrict_eq_zero_iff theorem restrict_nonzero_iff (μ : FiniteMeasure Ω) (A : Set Ω) : μ.restrict A ≠ 0 ↔ μ A ≠ 0 := by rw [← mass_nonzero_iff, restrict_mass] #align measure_theory.finite_measure.restrict_nonzero_iff MeasureTheory.FiniteMeasure.restrict_nonzero_iff variable [TopologicalSpace Ω] theorem ext_of_forall_lintegral_eq [HasOuterApproxClosed Ω] [BorelSpace Ω] {μ ν : FiniteMeasure Ω} (h : ∀ (f : Ω →ᵇ ℝ≥0), ∫⁻ x, f x ∂μ = ∫⁻ x, f x ∂ν) : μ = ν := by apply Subtype.ext change (μ : Measure Ω) = (ν : Measure Ω) exact ext_of_forall_lintegral_eq_of_IsFiniteMeasure h def testAgainstNN (μ : FiniteMeasure Ω) (f : Ω →ᵇ ℝ≥0) : ℝ≥0 := (∫⁻ ω, f ω ∂(μ : Measure Ω)).toNNReal #align measure_theory.finite_measure.test_against_nn MeasureTheory.FiniteMeasure.testAgainstNN @[simp] theorem testAgainstNN_coe_eq {μ : FiniteMeasure Ω} {f : Ω →ᵇ ℝ≥0} : (μ.testAgainstNN f : ℝ≥0∞) = ∫⁻ ω, f ω ∂(μ : Measure Ω) := ENNReal.coe_toNNReal (f.lintegral_lt_top_of_nnreal _).ne #align measure_theory.finite_measure.test_against_nn_coe_eq MeasureTheory.FiniteMeasure.testAgainstNN_coe_eq theorem testAgainstNN_const (μ : FiniteMeasure Ω) (c : ℝ≥0) : μ.testAgainstNN (BoundedContinuousFunction.const Ω c) = c * μ.mass := by simp [← ENNReal.coe_inj] #align measure_theory.finite_measure.test_against_nn_const MeasureTheory.FiniteMeasure.testAgainstNN_const theorem testAgainstNN_mono (μ : FiniteMeasure Ω) {f g : Ω →ᵇ ℝ≥0} (f_le_g : (f : Ω → ℝ≥0) ≤ g) : μ.testAgainstNN f ≤ μ.testAgainstNN g := by simp only [← ENNReal.coe_le_coe, testAgainstNN_coe_eq] gcongr apply f_le_g #align measure_theory.finite_measure.test_against_nn_mono MeasureTheory.FiniteMeasure.testAgainstNN_mono @[simp] theorem testAgainstNN_zero (μ : FiniteMeasure Ω) : μ.testAgainstNN 0 = 0 := by simpa only [zero_mul] using μ.testAgainstNN_const 0 #align measure_theory.finite_measure.test_against_nn_zero MeasureTheory.FiniteMeasure.testAgainstNN_zero @[simp]	Mathlib/MeasureTheory/Measure/FiniteMeasure.lean	363	365	theorem testAgainstNN_one (μ : FiniteMeasure Ω) : μ.testAgainstNN 1 = μ.mass := by	simp only [testAgainstNN, coe_one, Pi.one_apply, ENNReal.coe_one, lintegral_one] rfl
import Mathlib.Topology.Order.LocalExtr import Mathlib.Topology.Order.IntermediateValue import Mathlib.Topology.Support import Mathlib.Topology.Order.IsLUB #align_import topology.algebra.order.compact from "leanprover-community/mathlib"@"3efd324a3a31eaa40c9d5bfc669c4fafee5f9423" open Filter OrderDual TopologicalSpace Function Set open scoped Filter Topology class CompactIccSpace (α : Type) [TopologicalSpace α] [Preorder α] : Prop where isCompact_Icc : ∀ {a b : α}, IsCompact (Icc a b) #align compact_Icc_space CompactIccSpace export CompactIccSpace (isCompact_Icc) variable {α : Type} -- Porting note (#10756): new lemma; -- Porting note (#11215): TODO: make it the definition lemma CompactIccSpace.mk' [TopologicalSpace α] [Preorder α] (h : ∀ {a b : α}, a ≤ b → IsCompact (Icc a b)) : CompactIccSpace α where isCompact_Icc {a b} := by_cases h fun hab => by rw [Icc_eq_empty hab]; exact isCompact_empty -- Porting note (#10756): new lemma; -- Porting note (#11215): TODO: drop one `'` lemma CompactIccSpace.mk'' [TopologicalSpace α] [PartialOrder α] (h : ∀ {a b : α}, a < b → IsCompact (Icc a b)) : CompactIccSpace α := .mk' fun hab => hab.eq_or_lt.elim (by rintro rfl; simp) h instance [TopologicalSpace α] [Preorder α] [CompactIccSpace α] : CompactIccSpace (αᵒᵈ) where isCompact_Icc := by intro a b convert isCompact_Icc (α := α) (a := b) (b := a) using 1 exact dual_Icc (α := α) instance (priority := 100) ConditionallyCompleteLinearOrder.toCompactIccSpace (α : Type) [ConditionallyCompleteLinearOrder α] [TopologicalSpace α] [OrderTopology α] : CompactIccSpace α := by refine .mk'' fun {a b} hlt => ?_ rcases le_or_lt a b with hab \| hab swap · simp [hab] refine isCompact_iff_ultrafilter_le_nhds.2 fun f hf => ?_ contrapose! hf rw [le_principal_iff] have hpt : ∀ x ∈ Icc a b, {x} ∉ f := fun x hx hxf => hf x hx ((le_pure_iff.2 hxf).trans (pure_le_nhds x)) set s := { x ∈ Icc a b \| Icc a x ∉ f } have hsb : b ∈ upperBounds s := fun x hx => hx.1.2 have sbd : BddAbove s := ⟨b, hsb⟩ have ha : a ∈ s := by simp [s, hpt, hab] rcases hab.eq_or_lt with (rfl \| _hlt) · exact ha.2 -- Porting note: the `obtain` below was instead -- `set c := Sup s` -- `have hsc : IsLUB s c := isLUB_csSup ⟨a, ha⟩ sbd` obtain ⟨c, hsc⟩ : ∃ c, IsLUB s c := ⟨sSup s, isLUB_csSup ⟨a, ha⟩ ⟨b, hsb⟩⟩ have hc : c ∈ Icc a b := ⟨hsc.1 ha, hsc.2 hsb⟩ specialize hf c hc have hcs : c ∈ s := by rcases hc.1.eq_or_lt with (rfl \| hlt); · assumption refine ⟨hc, fun hcf => hf fun U hU => ?_⟩ rcases (mem_nhdsWithin_Iic_iff_exists_Ioc_subset' hlt).1 (mem_nhdsWithin_of_mem_nhds hU) with ⟨x, hxc, hxU⟩ rcases ((hsc.frequently_mem ⟨a, ha⟩).and_eventually (Ioc_mem_nhdsWithin_Iic ⟨hxc, le_rfl⟩)).exists with ⟨y, ⟨_hyab, hyf⟩, hy⟩ refine mem_of_superset (f.diff_mem_iff.2 ⟨hcf, hyf⟩) (Subset.trans ?_ hxU) rw [diff_subset_iff] exact Subset.trans Icc_subset_Icc_union_Ioc <\| union_subset_union Subset.rfl <\| Ioc_subset_Ioc_left hy.1.le rcases hc.2.eq_or_lt with (rfl \| hlt) · exact hcs.2 exfalso refine hf fun U hU => ?_ rcases (mem_nhdsWithin_Ici_iff_exists_mem_Ioc_Ico_subset hlt).1 (mem_nhdsWithin_of_mem_nhds hU) with ⟨y, hxy, hyU⟩ refine mem_of_superset ?_ hyU; clear! U have hy : y ∈ Icc a b := ⟨hc.1.trans hxy.1.le, hxy.2⟩ by_cases hay : Icc a y ∈ f · refine mem_of_superset (f.diff_mem_iff.2 ⟨f.diff_mem_iff.2 ⟨hay, hcs.2⟩, hpt y hy⟩) ?_ rw [diff_subset_iff, union_comm, Ico_union_right hxy.1.le, diff_subset_iff] exact Icc_subset_Icc_union_Icc · exact ((hsc.1 ⟨hy, hay⟩).not_lt hxy.1).elim #align conditionally_complete_linear_order.to_compact_Icc_space ConditionallyCompleteLinearOrder.toCompactIccSpace instance {ι : Type} {α : ι → Type} [∀ i, Preorder (α i)] [∀ i, TopologicalSpace (α i)] [∀ i, CompactIccSpace (α i)] : CompactIccSpace (∀ i, α i) := ⟨fun {a b} => (pi_univ_Icc a b ▸ isCompact_univ_pi) fun _ => isCompact_Icc⟩ instance Pi.compact_Icc_space' {α β : Type} [Preorder β] [TopologicalSpace β] [CompactIccSpace β] : CompactIccSpace (α → β) := inferInstance #align pi.compact_Icc_space' Pi.compact_Icc_space' instance {α β : Type} [Preorder α] [TopologicalSpace α] [CompactIccSpace α] [Preorder β] [TopologicalSpace β] [CompactIccSpace β] : CompactIccSpace (α × β) := ⟨fun {a b} => (Icc_prod_eq a b).symm ▸ isCompact_Icc.prod isCompact_Icc⟩ theorem isCompact_uIcc {α : Type} [LinearOrder α] [TopologicalSpace α] [CompactIccSpace α] {a b : α} : IsCompact (uIcc a b) := isCompact_Icc #align is_compact_uIcc isCompact_uIcc -- See note [lower instance priority] instance (priority := 100) compactSpace_of_completeLinearOrder {α : Type} [CompleteLinearOrder α] [TopologicalSpace α] [OrderTopology α] : CompactSpace α := ⟨by simp only [← Icc_bot_top, isCompact_Icc]⟩ #align compact_space_of_complete_linear_order compactSpace_of_completeLinearOrder section variable {α : Type} [Preorder α] [TopologicalSpace α] [CompactIccSpace α] instance compactSpace_Icc (a b : α) : CompactSpace (Icc a b) := isCompact_iff_compactSpace.mp isCompact_Icc #align compact_space_Icc compactSpace_Icc end section LinearOrder variable {α β γ : Type*} [LinearOrder α] [TopologicalSpace α] [TopologicalSpace β] [TopologicalSpace γ] theorem IsCompact.exists_isLeast [ClosedIicTopology α] {s : Set α} (hs : IsCompact s) (ne_s : s.Nonempty) : ∃ x, IsLeast s x := by haveI : Nonempty s := ne_s.to_subtype suffices (s ∩ ⋂ x ∈ s, Iic x).Nonempty from ⟨this.choose, this.choose_spec.1, mem_iInter₂.mp this.choose_spec.2⟩ rw [biInter_eq_iInter] by_contra H rw [not_nonempty_iff_eq_empty] at H rcases hs.elim_directed_family_closed (fun x : s => Iic ↑x) (fun x => isClosed_Iic) H (Monotone.directed_ge fun _ _ h => Iic_subset_Iic.mpr h) with ⟨x, hx⟩ exact not_nonempty_iff_eq_empty.mpr hx ⟨x, x.2, le_rfl⟩ #align is_compact.exists_is_least IsCompact.exists_isLeast theorem IsCompact.exists_isGreatest [ClosedIciTopology α] {s : Set α} (hs : IsCompact s) (ne_s : s.Nonempty) : ∃ x, IsGreatest s x := IsCompact.exists_isLeast (α := αᵒᵈ) hs ne_s #align is_compact.exists_is_greatest IsCompact.exists_isGreatest theorem IsCompact.exists_isGLB [ClosedIicTopology α] {s : Set α} (hs : IsCompact s) (ne_s : s.Nonempty) : ∃ x ∈ s, IsGLB s x := (hs.exists_isLeast ne_s).imp (fun x (hx : IsLeast s x) => ⟨hx.1, hx.isGLB⟩) #align is_compact.exists_is_glb IsCompact.exists_isGLB theorem IsCompact.exists_isLUB [ClosedIciTopology α] {s : Set α} (hs : IsCompact s) (ne_s : s.Nonempty) : ∃ x ∈ s, IsLUB s x := IsCompact.exists_isGLB (α := αᵒᵈ) hs ne_s #align is_compact.exists_is_lub IsCompact.exists_isLUB theorem cocompact_le_atBot_atTop [CompactIccSpace α] : cocompact α ≤ atBot ⊔ atTop := by refine fun s hs ↦ mem_cocompact.mpr <\| (isEmpty_or_nonempty α).casesOn ?_ ?_ <;> intro · exact ⟨∅, isCompact_empty, fun x _ ↦ (IsEmpty.false x).elim⟩ · obtain ⟨t, ht⟩ := mem_atBot_sets.mp hs.1 obtain ⟨u, hu⟩ := mem_atTop_sets.mp hs.2 refine ⟨Icc t u, isCompact_Icc, fun x hx ↦ ?_⟩ exact (not_and_or.mp hx).casesOn (fun h ↦ ht x (le_of_not_le h)) fun h ↦ hu x (le_of_not_le h) theorem cocompact_le_atBot [OrderTop α] [CompactIccSpace α] : cocompact α ≤ atBot := by refine fun _ hs ↦ mem_cocompact.mpr <\| (isEmpty_or_nonempty α).casesOn ?_ ?_ <;> intro · exact ⟨∅, isCompact_empty, fun x _ ↦ (IsEmpty.false x).elim⟩ · obtain ⟨t, ht⟩ := mem_atBot_sets.mp hs refine ⟨Icc t ⊤, isCompact_Icc, fun _ hx ↦ ?_⟩ exact (not_and_or.mp hx).casesOn (fun h ↦ ht _ (le_of_not_le h)) (fun h ↦ (h le_top).elim) theorem cocompact_le_atTop [OrderBot α] [CompactIccSpace α] : cocompact α ≤ atTop := cocompact_le_atBot (α := αᵒᵈ) theorem atBot_le_cocompact [NoMinOrder α] [ClosedIicTopology α] : atBot ≤ cocompact α := by refine fun s hs ↦ ?_ obtain ⟨t, ht, hts⟩ := mem_cocompact.mp hs refine (Set.eq_empty_or_nonempty t).casesOn (fun h_empty ↦ ?_) (fun h_nonempty ↦ ?_) · rewrite [compl_univ_iff.mpr h_empty, univ_subset_iff] at hts convert univ_mem · haveI := h_nonempty.nonempty obtain ⟨a, ha⟩ := ht.exists_isLeast h_nonempty obtain ⟨b, hb⟩ := exists_lt a exact Filter.mem_atBot_sets.mpr ⟨b, fun b' hb' ↦ hts <\| Classical.byContradiction fun hc ↦ LT.lt.false <\| hb'.trans_lt <\| hb.trans_le <\| ha.2 (not_not_mem.mp hc)⟩ theorem atTop_le_cocompact [NoMaxOrder α] [ClosedIciTopology α] : atTop ≤ cocompact α := atBot_le_cocompact (α := αᵒᵈ) theorem atBot_atTop_le_cocompact [NoMinOrder α] [NoMaxOrder α] [OrderClosedTopology α] : atBot ⊔ atTop ≤ cocompact α := sup_le atBot_le_cocompact atTop_le_cocompact @[simp 900] theorem cocompact_eq_atBot_atTop [NoMaxOrder α] [NoMinOrder α] [OrderClosedTopology α] [CompactIccSpace α] : cocompact α = atBot ⊔ atTop := cocompact_le_atBot_atTop.antisymm atBot_atTop_le_cocompact @[simp] theorem cocompact_eq_atBot [NoMinOrder α] [OrderTop α] [ClosedIicTopology α] [CompactIccSpace α] : cocompact α = atBot := cocompact_le_atBot.antisymm atBot_le_cocompact @[simp] theorem cocompact_eq_atTop [NoMaxOrder α] [OrderBot α] [ClosedIciTopology α] [CompactIccSpace α] : cocompact α = atTop := cocompact_le_atTop.antisymm atTop_le_cocompact -- Porting note (#10756): new lemma; defeq to the old one but allows us to use dot notation theorem IsCompact.exists_isMinOn [ClosedIicTopology α] {s : Set β} (hs : IsCompact s) (ne_s : s.Nonempty) {f : β → α} (hf : ContinuousOn f s) : ∃ x ∈ s, IsMinOn f s x := by rcases (hs.image_of_continuousOn hf).exists_isLeast (ne_s.image f) with ⟨_, ⟨x, hxs, rfl⟩, hx⟩ exact ⟨x, hxs, forall_mem_image.1 hx⟩ theorem IsCompact.exists_forall_le' [ClosedIicTopology α] [NoMaxOrder α] {f : β → α} {s : Set β} (hs : IsCompact s) (hf : ContinuousOn f s) {a : α} (hf' : ∀ b ∈ s, a < f b) : ∃ a', a < a' ∧ ∀ b ∈ s, a' ≤ f b := by rcases s.eq_empty_or_nonempty with (rfl \| hs') · obtain ⟨a', ha'⟩ := exists_gt a exact ⟨a', ha', fun _ a ↦ a.elim⟩ · obtain ⟨x, hx, hx'⟩ := hs.exists_isMinOn hs' hf exact ⟨f x, hf' x hx, hx'⟩ @[deprecated IsCompact.exists_isMinOn (since := "2023-02-06")] theorem IsCompact.exists_forall_le [ClosedIicTopology α] {s : Set β} (hs : IsCompact s) (ne_s : s.Nonempty) {f : β → α} (hf : ContinuousOn f s) : ∃ x ∈ s, ∀ y ∈ s, f x ≤ f y := hs.exists_isMinOn ne_s hf #align is_compact.exists_forall_le IsCompact.exists_forall_le -- Porting note (#10756): new lemma; defeq to the old one but allows us to use dot notation theorem IsCompact.exists_isMaxOn [ClosedIciTopology α] {s : Set β} (hs : IsCompact s) (ne_s : s.Nonempty) {f : β → α} (hf : ContinuousOn f s) : ∃ x ∈ s, IsMaxOn f s x := IsCompact.exists_isMinOn (α := αᵒᵈ) hs ne_s hf @[deprecated IsCompact.exists_isMaxOn (since := "2023-02-06")] theorem IsCompact.exists_forall_ge [ClosedIciTopology α] {s : Set β} (hs : IsCompact s) (ne_s : s.Nonempty) {f : β → α} (hf : ContinuousOn f s) : ∃ x ∈ s, ∀ y ∈ s, f y ≤ f x := IsCompact.exists_isMaxOn hs ne_s hf #align is_compact.exists_forall_ge IsCompact.exists_forall_ge theorem ContinuousOn.exists_isMinOn' [ClosedIicTopology α] {s : Set β} {f : β → α} (hf : ContinuousOn f s) (hsc : IsClosed s) {x₀ : β} (h₀ : x₀ ∈ s) (hc : ∀ᶠ x in cocompact β ⊓ 𝓟 s, f x₀ ≤ f x) : ∃ x ∈ s, IsMinOn f s x := by rcases (hasBasis_cocompact.inf_principal _).eventually_iff.1 hc with ⟨K, hK, hKf⟩ have hsub : insert x₀ (K ∩ s) ⊆ s := insert_subset_iff.2 ⟨h₀, inter_subset_right⟩ obtain ⟨x, hx, hxf⟩ : ∃ x ∈ insert x₀ (K ∩ s), ∀ y ∈ insert x₀ (K ∩ s), f x ≤ f y := ((hK.inter_right hsc).insert x₀).exists_isMinOn (insert_nonempty _ _) (hf.mono hsub) refine ⟨x, hsub hx, fun y hy => ?_⟩ by_cases hyK : y ∈ K exacts [hxf _ (Or.inr ⟨hyK, hy⟩), (hxf _ (Or.inl rfl)).trans (hKf ⟨hyK, hy⟩)] @[deprecated ContinuousOn.exists_isMinOn' (since := "2023-02-06")] theorem ContinuousOn.exists_forall_le' [ClosedIicTopology α] {s : Set β} {f : β → α} (hf : ContinuousOn f s) (hsc : IsClosed s) {x₀ : β} (h₀ : x₀ ∈ s) (hc : ∀ᶠ x in cocompact β ⊓ 𝓟 s, f x₀ ≤ f x) : ∃ x ∈ s, ∀ y ∈ s, f x ≤ f y := hf.exists_isMinOn' hsc h₀ hc #align continuous_on.exists_forall_le' ContinuousOn.exists_forall_le' theorem ContinuousOn.exists_isMaxOn' [ClosedIciTopology α] {s : Set β} {f : β → α} (hf : ContinuousOn f s) (hsc : IsClosed s) {x₀ : β} (h₀ : x₀ ∈ s) (hc : ∀ᶠ x in cocompact β ⊓ 𝓟 s, f x ≤ f x₀) : ∃ x ∈ s, IsMaxOn f s x := ContinuousOn.exists_isMinOn' (α := αᵒᵈ) hf hsc h₀ hc @[deprecated ContinuousOn.exists_isMaxOn' (since := "2023-02-06")] theorem ContinuousOn.exists_forall_ge' [ClosedIciTopology α] {s : Set β} {f : β → α} (hf : ContinuousOn f s) (hsc : IsClosed s) {x₀ : β} (h₀ : x₀ ∈ s) (hc : ∀ᶠ x in cocompact β ⊓ 𝓟 s, f x ≤ f x₀) : ∃ x ∈ s, ∀ y ∈ s, f y ≤ f x := hf.exists_isMaxOn' hsc h₀ hc #align continuous_on.exists_forall_ge' ContinuousOn.exists_forall_ge' theorem Continuous.exists_forall_le' [ClosedIicTopology α] {f : β → α} (hf : Continuous f) (x₀ : β) (h : ∀ᶠ x in cocompact β, f x₀ ≤ f x) : ∃ x : β, ∀ y : β, f x ≤ f y := let ⟨x, _, hx⟩ := hf.continuousOn.exists_isMinOn' isClosed_univ (mem_univ x₀) (by rwa [principal_univ, inf_top_eq]) ⟨x, fun y => hx (mem_univ y)⟩ #align continuous.exists_forall_le' Continuous.exists_forall_le' theorem Continuous.exists_forall_ge' [ClosedIciTopology α] {f : β → α} (hf : Continuous f) (x₀ : β) (h : ∀ᶠ x in cocompact β, f x ≤ f x₀) : ∃ x : β, ∀ y : β, f y ≤ f x := Continuous.exists_forall_le' (α := αᵒᵈ) hf x₀ h #align continuous.exists_forall_ge' Continuous.exists_forall_ge'	Mathlib/Topology/Algebra/Order/Compact.lean	357	360	theorem Continuous.exists_forall_le [ClosedIicTopology α] [Nonempty β] {f : β → α} (hf : Continuous f) (hlim : Tendsto f (cocompact β) atTop) : ∃ x, ∀ y, f x ≤ f y := by	inhabit β exact hf.exists_forall_le' default (hlim.eventually <\| eventually_ge_atTop _)
import Mathlib.Analysis.SpecialFunctions.Trigonometric.Inverse import Mathlib.Analysis.SpecialFunctions.Trigonometric.Deriv #align_import analysis.special_functions.trigonometric.inverse_deriv from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" noncomputable section open scoped Classical Topology Filter open Set Filter open scoped Real namespace Real section Arcsin theorem deriv_arcsin_aux {x : ℝ} (h₁ : x ≠ -1) (h₂ : x ≠ 1) : HasStrictDerivAt arcsin (1 / √(1 - x ^ 2)) x ∧ ContDiffAt ℝ ⊤ arcsin x := by cases' h₁.lt_or_lt with h₁ h₁ · have : 1 - x ^ 2 < 0 := by nlinarith [h₁] rw [sqrt_eq_zero'.2 this.le, div_zero] have : arcsin =ᶠ[𝓝 x] fun _ => -(π / 2) := (gt_mem_nhds h₁).mono fun y hy => arcsin_of_le_neg_one hy.le exact ⟨(hasStrictDerivAt_const _ _).congr_of_eventuallyEq this.symm, contDiffAt_const.congr_of_eventuallyEq this⟩ cases' h₂.lt_or_lt with h₂ h₂ · have : 0 < √(1 - x ^ 2) := sqrt_pos.2 (by nlinarith [h₁, h₂]) simp only [← cos_arcsin, one_div] at this ⊢ exact ⟨sinPartialHomeomorph.hasStrictDerivAt_symm ⟨h₁, h₂⟩ this.ne' (hasStrictDerivAt_sin _), sinPartialHomeomorph.contDiffAt_symm_deriv this.ne' ⟨h₁, h₂⟩ (hasDerivAt_sin _) contDiff_sin.contDiffAt⟩ · have : 1 - x ^ 2 < 0 := by nlinarith [h₂] rw [sqrt_eq_zero'.2 this.le, div_zero] have : arcsin =ᶠ[𝓝 x] fun _ => π / 2 := (lt_mem_nhds h₂).mono fun y hy => arcsin_of_one_le hy.le exact ⟨(hasStrictDerivAt_const _ _).congr_of_eventuallyEq this.symm, contDiffAt_const.congr_of_eventuallyEq this⟩ #align real.deriv_arcsin_aux Real.deriv_arcsin_aux theorem hasStrictDerivAt_arcsin {x : ℝ} (h₁ : x ≠ -1) (h₂ : x ≠ 1) : HasStrictDerivAt arcsin (1 / √(1 - x ^ 2)) x := (deriv_arcsin_aux h₁ h₂).1 #align real.has_strict_deriv_at_arcsin Real.hasStrictDerivAt_arcsin theorem hasDerivAt_arcsin {x : ℝ} (h₁ : x ≠ -1) (h₂ : x ≠ 1) : HasDerivAt arcsin (1 / √(1 - x ^ 2)) x := (hasStrictDerivAt_arcsin h₁ h₂).hasDerivAt #align real.has_deriv_at_arcsin Real.hasDerivAt_arcsin theorem contDiffAt_arcsin {x : ℝ} (h₁ : x ≠ -1) (h₂ : x ≠ 1) {n : ℕ∞} : ContDiffAt ℝ n arcsin x := (deriv_arcsin_aux h₁ h₂).2.of_le le_top #align real.cont_diff_at_arcsin Real.contDiffAt_arcsin theorem hasDerivWithinAt_arcsin_Ici {x : ℝ} (h : x ≠ -1) : HasDerivWithinAt arcsin (1 / √(1 - x ^ 2)) (Ici x) x := by rcases eq_or_ne x 1 with (rfl \| h') · convert (hasDerivWithinAt_const (1 : ℝ) _ (π / 2)).congr _ _ <;> simp (config := { contextual := true }) [arcsin_of_one_le] · exact (hasDerivAt_arcsin h h').hasDerivWithinAt #align real.has_deriv_within_at_arcsin_Ici Real.hasDerivWithinAt_arcsin_Ici theorem hasDerivWithinAt_arcsin_Iic {x : ℝ} (h : x ≠ 1) : HasDerivWithinAt arcsin (1 / √(1 - x ^ 2)) (Iic x) x := by rcases em (x = -1) with (rfl \| h') · convert (hasDerivWithinAt_const (-1 : ℝ) _ (-(π / 2))).congr _ _ <;> simp (config := { contextual := true }) [arcsin_of_le_neg_one] · exact (hasDerivAt_arcsin h' h).hasDerivWithinAt #align real.has_deriv_within_at_arcsin_Iic Real.hasDerivWithinAt_arcsin_Iic	Mathlib/Analysis/SpecialFunctions/Trigonometric/InverseDeriv.lean	82	90	theorem differentiableWithinAt_arcsin_Ici {x : ℝ} : DifferentiableWithinAt ℝ arcsin (Ici x) x ↔ x ≠ -1 := by	refine ⟨?_, fun h => (hasDerivWithinAt_arcsin_Ici h).differentiableWithinAt⟩ rintro h rfl have : sin ∘ arcsin =ᶠ[𝓝[≥] (-1 : ℝ)] id := by filter_upwards [Icc_mem_nhdsWithin_Ici ⟨le_rfl, neg_lt_self (zero_lt_one' ℝ)⟩] with x using sin_arcsin' have := h.hasDerivWithinAt.sin.congr_of_eventuallyEq this.symm (by simp) simpa using (uniqueDiffOn_Ici _ _ left_mem_Ici).eq_deriv _ this (hasDerivWithinAt_id _ _)
import Mathlib.Topology.Category.TopCat.Limits.Products #align_import topology.category.Top.limits.pullbacks from "leanprover-community/mathlib"@"178a32653e369dce2da68dc6b2694e385d484ef1" -- Porting note: every ML3 decl has an uppercase letter set_option linter.uppercaseLean3 false open TopologicalSpace open CategoryTheory open CategoryTheory.Limits universe v u w noncomputable section namespace TopCat variable {J : Type v} [SmallCategory J] section Pullback variable {X Y Z : TopCat.{u}} abbrev pullbackFst (f : X ⟶ Z) (g : Y ⟶ Z) : TopCat.of { p : X × Y // f p.1 = g p.2 } ⟶ X := ⟨Prod.fst ∘ Subtype.val, by apply Continuous.comp <;> set_option tactic.skipAssignedInstances false in continuity⟩ #align Top.pullback_fst TopCat.pullbackFst lemma pullbackFst_apply (f : X ⟶ Z) (g : Y ⟶ Z) (x) : pullbackFst f g x = x.1.1 := rfl abbrev pullbackSnd (f : X ⟶ Z) (g : Y ⟶ Z) : TopCat.of { p : X × Y // f p.1 = g p.2 } ⟶ Y := ⟨Prod.snd ∘ Subtype.val, by apply Continuous.comp <;> set_option tactic.skipAssignedInstances false in continuity⟩ #align Top.pullback_snd TopCat.pullbackSnd lemma pullbackSnd_apply (f : X ⟶ Z) (g : Y ⟶ Z) (x) : pullbackSnd f g x = x.1.2 := rfl def pullbackCone (f : X ⟶ Z) (g : Y ⟶ Z) : PullbackCone f g := PullbackCone.mk (pullbackFst f g) (pullbackSnd f g) (by dsimp [pullbackFst, pullbackSnd, Function.comp_def] ext ⟨x, h⟩ -- Next 2 lines were -- `rw [comp_apply, ContinuousMap.coe_mk, comp_apply, ContinuousMap.coe_mk]` -- `exact h` before leanprover/lean4#2644 rw [comp_apply, comp_apply] congr!) #align Top.pullback_cone TopCat.pullbackCone def pullbackConeIsLimit (f : X ⟶ Z) (g : Y ⟶ Z) : IsLimit (pullbackCone f g) := PullbackCone.isLimitAux' _ (by intro S constructor; swap · exact { toFun := fun x => ⟨⟨S.fst x, S.snd x⟩, by simpa using ConcreteCategory.congr_hom S.condition x⟩ continuous_toFun := by apply Continuous.subtype_mk <\| Continuous.prod_mk ?_ ?_ · exact (PullbackCone.fst S)\|>.continuous_toFun · exact (PullbackCone.snd S)\|>.continuous_toFun } refine ⟨?_, ?_, ?_⟩ · delta pullbackCone ext a -- This used to be `rw`, but we need `erw` after leanprover/lean4#2644 erw [comp_apply, ContinuousMap.coe_mk] · delta pullbackCone ext a -- This used to be `rw`, but we need `erw` after leanprover/lean4#2644 erw [comp_apply, ContinuousMap.coe_mk] · intro m h₁ h₂ -- Porting note: used to be ext x apply ContinuousMap.ext; intro x apply Subtype.ext apply Prod.ext · simpa using ConcreteCategory.congr_hom h₁ x · simpa using ConcreteCategory.congr_hom h₂ x) #align Top.pullback_cone_is_limit TopCat.pullbackConeIsLimit def pullbackIsoProdSubtype (f : X ⟶ Z) (g : Y ⟶ Z) : pullback f g ≅ TopCat.of { p : X × Y // f p.1 = g p.2 } := (limit.isLimit _).conePointUniqueUpToIso (pullbackConeIsLimit f g) #align Top.pullback_iso_prod_subtype TopCat.pullbackIsoProdSubtype @[reassoc (attr := simp)] theorem pullbackIsoProdSubtype_inv_fst (f : X ⟶ Z) (g : Y ⟶ Z) : (pullbackIsoProdSubtype f g).inv ≫ pullback.fst = pullbackFst f g := by simp [pullbackCone, pullbackIsoProdSubtype] #align Top.pullback_iso_prod_subtype_inv_fst TopCat.pullbackIsoProdSubtype_inv_fst theorem pullbackIsoProdSubtype_inv_fst_apply (f : X ⟶ Z) (g : Y ⟶ Z) (x : { p : X × Y // f p.1 = g p.2 }) : (pullback.fst : pullback f g ⟶ _) ((pullbackIsoProdSubtype f g).inv x) = (x : X × Y).fst := ConcreteCategory.congr_hom (pullbackIsoProdSubtype_inv_fst f g) x #align Top.pullback_iso_prod_subtype_inv_fst_apply TopCat.pullbackIsoProdSubtype_inv_fst_apply @[reassoc (attr := simp)] theorem pullbackIsoProdSubtype_inv_snd (f : X ⟶ Z) (g : Y ⟶ Z) : (pullbackIsoProdSubtype f g).inv ≫ pullback.snd = pullbackSnd f g := by simp [pullbackCone, pullbackIsoProdSubtype] #align Top.pullback_iso_prod_subtype_inv_snd TopCat.pullbackIsoProdSubtype_inv_snd theorem pullbackIsoProdSubtype_inv_snd_apply (f : X ⟶ Z) (g : Y ⟶ Z) (x : { p : X × Y // f p.1 = g p.2 }) : (pullback.snd : pullback f g ⟶ _) ((pullbackIsoProdSubtype f g).inv x) = (x : X × Y).snd := ConcreteCategory.congr_hom (pullbackIsoProdSubtype_inv_snd f g) x #align Top.pullback_iso_prod_subtype_inv_snd_apply TopCat.pullbackIsoProdSubtype_inv_snd_apply theorem pullbackIsoProdSubtype_hom_fst (f : X ⟶ Z) (g : Y ⟶ Z) : (pullbackIsoProdSubtype f g).hom ≫ pullbackFst f g = pullback.fst := by rw [← Iso.eq_inv_comp, pullbackIsoProdSubtype_inv_fst] #align Top.pullback_iso_prod_subtype_hom_fst TopCat.pullbackIsoProdSubtype_hom_fst theorem pullbackIsoProdSubtype_hom_snd (f : X ⟶ Z) (g : Y ⟶ Z) : (pullbackIsoProdSubtype f g).hom ≫ pullbackSnd f g = pullback.snd := by rw [← Iso.eq_inv_comp, pullbackIsoProdSubtype_inv_snd] #align Top.pullback_iso_prod_subtype_hom_snd TopCat.pullbackIsoProdSubtype_hom_snd -- Porting note: why do I need to tell Lean to coerce pullback to a type theorem pullbackIsoProdSubtype_hom_apply {f : X ⟶ Z} {g : Y ⟶ Z} (x : ConcreteCategory.forget.obj (pullback f g)) : (pullbackIsoProdSubtype f g).hom x = ⟨⟨(pullback.fst : pullback f g ⟶ _) x, (pullback.snd : pullback f g ⟶ _) x⟩, by simpa using ConcreteCategory.congr_hom pullback.condition x⟩ := by apply Subtype.ext; apply Prod.ext exacts [ConcreteCategory.congr_hom (pullbackIsoProdSubtype_hom_fst f g) x, ConcreteCategory.congr_hom (pullbackIsoProdSubtype_hom_snd f g) x] #align Top.pullback_iso_prod_subtype_hom_apply TopCat.pullbackIsoProdSubtype_hom_apply theorem pullback_topology {X Y Z : TopCat.{u}} (f : X ⟶ Z) (g : Y ⟶ Z) : (pullback f g).str = induced (pullback.fst : pullback f g ⟶ _) X.str ⊓ induced (pullback.snd : pullback f g ⟶ _) Y.str := by let homeo := homeoOfIso (pullbackIsoProdSubtype f g) refine homeo.inducing.induced.trans ?_ change induced homeo (induced _ ( (induced Prod.fst X.str) ⊓ (induced Prod.snd Y.str))) = _ simp only [induced_compose, induced_inf] congr #align Top.pullback_topology TopCat.pullback_topology theorem range_pullback_to_prod {X Y Z : TopCat} (f : X ⟶ Z) (g : Y ⟶ Z) : Set.range (prod.lift pullback.fst pullback.snd : pullback f g ⟶ X ⨯ Y) = { x \| (Limits.prod.fst ≫ f) x = (Limits.prod.snd ≫ g) x } := by ext x constructor · rintro ⟨y, rfl⟩ change (_ ≫ _ ≫ f) _ = (_ ≫ _ ≫ g) _ -- new `change` after #13170 simp [pullback.condition] · rintro (h : f (_, _).1 = g (_, _).2) use (pullbackIsoProdSubtype f g).inv ⟨⟨_, _⟩, h⟩ change (forget TopCat).map _ _ = _ -- new `change` after #13170 apply Concrete.limit_ext rintro ⟨⟨⟩⟩ <;> erw [← comp_apply, ← comp_apply, limit.lift_π] <;> -- now `erw` after #13170 -- This used to be `simp` before leanprover/lean4#2644 aesop_cat #align Top.range_pullback_to_prod TopCat.range_pullback_to_prod noncomputable def pullbackHomeoPreimage {X Y Z : Type*} [TopologicalSpace X] [TopologicalSpace Y] [TopologicalSpace Z] (f : X → Z) (hf : Continuous f) (g : Y → Z) (hg : Embedding g) : { p : X × Y // f p.1 = g p.2 } ≃ₜ f ⁻¹' Set.range g where toFun := fun x ↦ ⟨x.1.1, _, x.2.symm⟩ invFun := fun x ↦ ⟨⟨x.1, Exists.choose x.2⟩, (Exists.choose_spec x.2).symm⟩ left_inv := by intro x ext <;> dsimp apply hg.inj convert x.prop exact Exists.choose_spec (p := fun y ↦ g y = f (↑x : X × Y).1) _ right_inv := fun x ↦ rfl continuous_toFun := by apply Continuous.subtype_mk exact continuous_fst.comp continuous_subtype_val continuous_invFun := by apply Continuous.subtype_mk refine continuous_prod_mk.mpr ⟨continuous_subtype_val, hg.toInducing.continuous_iff.mpr ?_⟩ convert hf.comp continuous_subtype_val ext x exact Exists.choose_spec x.2 theorem inducing_pullback_to_prod {X Y Z : TopCat.{u}} (f : X ⟶ Z) (g : Y ⟶ Z) : Inducing <\| ⇑(prod.lift pullback.fst pullback.snd : pullback f g ⟶ X ⨯ Y) := ⟨by simp [topologicalSpace_coe, prod_topology, pullback_topology, induced_compose, ← coe_comp]⟩ #align Top.inducing_pullback_to_prod TopCat.inducing_pullback_to_prod theorem embedding_pullback_to_prod {X Y Z : TopCat.{u}} (f : X ⟶ Z) (g : Y ⟶ Z) : Embedding <\| ⇑(prod.lift pullback.fst pullback.snd : pullback f g ⟶ X ⨯ Y) := ⟨inducing_pullback_to_prod f g, (TopCat.mono_iff_injective _).mp inferInstance⟩ #align Top.embedding_pullback_to_prod TopCat.embedding_pullback_to_prod theorem range_pullback_map {W X Y Z S T : TopCat} (f₁ : W ⟶ S) (f₂ : X ⟶ S) (g₁ : Y ⟶ T) (g₂ : Z ⟶ T) (i₁ : W ⟶ Y) (i₂ : X ⟶ Z) (i₃ : S ⟶ T) [H₃ : Mono i₃] (eq₁ : f₁ ≫ i₃ = i₁ ≫ g₁) (eq₂ : f₂ ≫ i₃ = i₂ ≫ g₂) : Set.range (pullback.map f₁ f₂ g₁ g₂ i₁ i₂ i₃ eq₁ eq₂) = (pullback.fst : pullback g₁ g₂ ⟶ _) ⁻¹' Set.range i₁ ∩ (pullback.snd : pullback g₁ g₂ ⟶ _) ⁻¹' Set.range i₂ := by ext constructor · rintro ⟨y, rfl⟩ simp only [Set.mem_inter_iff, Set.mem_preimage, Set.mem_range] erw [← comp_apply, ← comp_apply] -- now `erw` after #13170 simp only [limit.lift_π, PullbackCone.mk_pt, PullbackCone.mk_π_app, comp_apply] exact ⟨exists_apply_eq_apply _ _, exists_apply_eq_apply _ _⟩ rintro ⟨⟨x₁, hx₁⟩, ⟨x₂, hx₂⟩⟩ have : f₁ x₁ = f₂ x₂ := by apply (TopCat.mono_iff_injective _).mp H₃ erw [← comp_apply, eq₁, ← comp_apply, eq₂, -- now `erw` after #13170 comp_apply, comp_apply, hx₁, hx₂, ← comp_apply, pullback.condition] rfl -- `rfl` was not needed before #13170 use (pullbackIsoProdSubtype f₁ f₂).inv ⟨⟨x₁, x₂⟩, this⟩ change (forget TopCat).map _ _ = _ apply Concrete.limit_ext rintro (_ \| _ \| _) <;> erw [← comp_apply, ← comp_apply] -- now `erw` after #13170 simp only [Category.assoc, limit.lift_π, PullbackCone.mk_π_app_one] · simp only [cospan_one, pullbackIsoProdSubtype_inv_fst_assoc, comp_apply] erw [pullbackFst_apply, hx₁] rw [← limit.w _ WalkingCospan.Hom.inl, cospan_map_inl, comp_apply (g := g₁)] rfl -- `rfl` was not needed before #13170 · simp only [cospan_left, limit.lift_π, PullbackCone.mk_pt, PullbackCone.mk_π_app, pullbackIsoProdSubtype_inv_fst_assoc, comp_apply] erw [hx₁] -- now `erw` after #13170 rfl -- `rfl` was not needed before #13170 · simp only [cospan_right, limit.lift_π, PullbackCone.mk_pt, PullbackCone.mk_π_app, pullbackIsoProdSubtype_inv_snd_assoc, comp_apply] erw [hx₂] -- now `erw` after #13170 rfl -- `rfl` was not needed before #13170 #align Top.range_pullback_map TopCat.range_pullback_map theorem pullback_fst_range {X Y S : TopCat} (f : X ⟶ S) (g : Y ⟶ S) : Set.range (pullback.fst : pullback f g ⟶ _) = { x : X \| ∃ y : Y, f x = g y } := by ext x constructor · rintro ⟨(y : (forget TopCat).obj _), rfl⟩ use (pullback.snd : pullback f g ⟶ _) y exact ConcreteCategory.congr_hom pullback.condition y · rintro ⟨y, eq⟩ use (TopCat.pullbackIsoProdSubtype f g).inv ⟨⟨x, y⟩, eq⟩ rw [pullbackIsoProdSubtype_inv_fst_apply] #align Top.pullback_fst_range TopCat.pullback_fst_range theorem pullback_snd_range {X Y S : TopCat} (f : X ⟶ S) (g : Y ⟶ S) : Set.range (pullback.snd : pullback f g ⟶ _) = { y : Y \| ∃ x : X, f x = g y } := by ext y constructor · rintro ⟨(x : (forget TopCat).obj _), rfl⟩ use (pullback.fst : pullback f g ⟶ _) x exact ConcreteCategory.congr_hom pullback.condition x · rintro ⟨x, eq⟩ use (TopCat.pullbackIsoProdSubtype f g).inv ⟨⟨x, y⟩, eq⟩ rw [pullbackIsoProdSubtype_inv_snd_apply] #align Top.pullback_snd_range TopCat.pullback_snd_range theorem pullback_map_embedding_of_embeddings {W X Y Z S T : TopCat.{u}} (f₁ : W ⟶ S) (f₂ : X ⟶ S) (g₁ : Y ⟶ T) (g₂ : Z ⟶ T) {i₁ : W ⟶ Y} {i₂ : X ⟶ Z} (H₁ : Embedding i₁) (H₂ : Embedding i₂) (i₃ : S ⟶ T) (eq₁ : f₁ ≫ i₃ = i₁ ≫ g₁) (eq₂ : f₂ ≫ i₃ = i₂ ≫ g₂) : Embedding (pullback.map f₁ f₂ g₁ g₂ i₁ i₂ i₃ eq₁ eq₂) := by refine embedding_of_embedding_compose (ContinuousMap.continuous_toFun _) (show Continuous (prod.lift pullback.fst pullback.snd : pullback g₁ g₂ ⟶ Y ⨯ Z) from ContinuousMap.continuous_toFun _) ?_ suffices Embedding (prod.lift pullback.fst pullback.snd ≫ Limits.prod.map i₁ i₂ : pullback f₁ f₂ ⟶ _) by simpa [← coe_comp] using this rw [coe_comp] exact Embedding.comp (embedding_prod_map H₁ H₂) (embedding_pullback_to_prod _ _) #align Top.pullback_map_embedding_of_embeddings TopCat.pullback_map_embedding_of_embeddings theorem pullback_map_openEmbedding_of_open_embeddings {W X Y Z S T : TopCat.{u}} (f₁ : W ⟶ S) (f₂ : X ⟶ S) (g₁ : Y ⟶ T) (g₂ : Z ⟶ T) {i₁ : W ⟶ Y} {i₂ : X ⟶ Z} (H₁ : OpenEmbedding i₁) (H₂ : OpenEmbedding i₂) (i₃ : S ⟶ T) [H₃ : Mono i₃] (eq₁ : f₁ ≫ i₃ = i₁ ≫ g₁) (eq₂ : f₂ ≫ i₃ = i₂ ≫ g₂) : OpenEmbedding (pullback.map f₁ f₂ g₁ g₂ i₁ i₂ i₃ eq₁ eq₂) := by constructor · apply pullback_map_embedding_of_embeddings f₁ f₂ g₁ g₂ H₁.toEmbedding H₂.toEmbedding i₃ eq₁ eq₂ · rw [range_pullback_map] apply IsOpen.inter <;> apply Continuous.isOpen_preimage · apply ContinuousMap.continuous_toFun · exact H₁.isOpen_range · apply ContinuousMap.continuous_toFun · exact H₂.isOpen_range #align Top.pullback_map_open_embedding_of_open_embeddings TopCat.pullback_map_openEmbedding_of_open_embeddings	Mathlib/Topology/Category/TopCat/Limits/Pullbacks.lean	323	329	theorem snd_embedding_of_left_embedding {X Y S : TopCat} {f : X ⟶ S} (H : Embedding f) (g : Y ⟶ S) : Embedding <\| ⇑(pullback.snd : pullback f g ⟶ Y) := by	convert (homeoOfIso (asIso (pullback.snd : pullback (𝟙 S) g ⟶ _))).embedding.comp (pullback_map_embedding_of_embeddings (i₂ := 𝟙 Y) f g (𝟙 S) g H (homeoOfIso (Iso.refl _)).embedding (𝟙 _) rfl (by simp)) erw [← coe_comp] simp
import Mathlib.Algebra.Group.Basic import Mathlib.Algebra.Order.Monoid.Canonical.Defs import Mathlib.Data.Set.Function import Mathlib.Order.Interval.Set.Basic #align_import data.set.intervals.monoid from "leanprover-community/mathlib"@"aba57d4d3dae35460225919dcd82fe91355162f9" namespace Set variable {M : Type*} [OrderedCancelAddCommMonoid M] [ExistsAddOfLE M] (a b c d : M)	Mathlib/Algebra/Order/Interval/Set/Monoid.lean	27	32	theorem Ici_add_bij : BijOn (· + d) (Ici a) (Ici (a + d)) := by	refine ⟨fun x h => add_le_add_right (mem_Ici.mp h) _, (add_left_injective d).injOn, fun _ h => ?_⟩ obtain ⟨c, rfl⟩ := exists_add_of_le (mem_Ici.mp h) rw [mem_Ici, add_right_comm, add_le_add_iff_right] at h exact ⟨a + c, h, by rw [add_right_comm]⟩
import Mathlib.Topology.Maps import Mathlib.Topology.NhdsSet #align_import topology.constructions from "leanprover-community/mathlib"@"f7ebde7ee0d1505dfccac8644ae12371aa3c1c9f" noncomputable section open scoped Classical open Topology TopologicalSpace Set Filter Function universe u v variable {X : Type u} {Y : Type v} {Z W ε ζ : Type} section Constructions instance instTopologicalSpaceSubtype {p : X → Prop} [t : TopologicalSpace X] : TopologicalSpace (Subtype p) := induced (↑) t instance {r : X → X → Prop} [t : TopologicalSpace X] : TopologicalSpace (Quot r) := coinduced (Quot.mk r) t instance instTopologicalSpaceQuotient {s : Setoid X} [t : TopologicalSpace X] : TopologicalSpace (Quotient s) := coinduced Quotient.mk' t instance instTopologicalSpaceProd [t₁ : TopologicalSpace X] [t₂ : TopologicalSpace Y] : TopologicalSpace (X × Y) := induced Prod.fst t₁ ⊓ induced Prod.snd t₂ instance instTopologicalSpaceSum [t₁ : TopologicalSpace X] [t₂ : TopologicalSpace Y] : TopologicalSpace (X ⊕ Y) := coinduced Sum.inl t₁ ⊔ coinduced Sum.inr t₂ instance instTopologicalSpaceSigma {ι : Type} {X : ι → Type v} [t₂ : ∀ i, TopologicalSpace (X i)] : TopologicalSpace (Sigma X) := ⨆ i, coinduced (Sigma.mk i) (t₂ i) instance Pi.topologicalSpace {ι : Type} {Y : ι → Type v} [t₂ : (i : ι) → TopologicalSpace (Y i)] : TopologicalSpace ((i : ι) → Y i) := ⨅ i, induced (fun f => f i) (t₂ i) #align Pi.topological_space Pi.topologicalSpace instance ULift.topologicalSpace [t : TopologicalSpace X] : TopologicalSpace (ULift.{v, u} X) := t.induced ULift.down #align ulift.topological_space ULift.topologicalSpace section variable [TopologicalSpace X] open Additive Multiplicative instance : TopologicalSpace (Additive X) := ‹TopologicalSpace X› instance : TopologicalSpace (Multiplicative X) := ‹TopologicalSpace X› instance [DiscreteTopology X] : DiscreteTopology (Additive X) := ‹DiscreteTopology X› instance [DiscreteTopology X] : DiscreteTopology (Multiplicative X) := ‹DiscreteTopology X› theorem continuous_ofMul : Continuous (ofMul : X → Additive X) := continuous_id #align continuous_of_mul continuous_ofMul theorem continuous_toMul : Continuous (toMul : Additive X → X) := continuous_id #align continuous_to_mul continuous_toMul theorem continuous_ofAdd : Continuous (ofAdd : X → Multiplicative X) := continuous_id #align continuous_of_add continuous_ofAdd theorem continuous_toAdd : Continuous (toAdd : Multiplicative X → X) := continuous_id #align continuous_to_add continuous_toAdd theorem isOpenMap_ofMul : IsOpenMap (ofMul : X → Additive X) := IsOpenMap.id #align is_open_map_of_mul isOpenMap_ofMul theorem isOpenMap_toMul : IsOpenMap (toMul : Additive X → X) := IsOpenMap.id #align is_open_map_to_mul isOpenMap_toMul theorem isOpenMap_ofAdd : IsOpenMap (ofAdd : X → Multiplicative X) := IsOpenMap.id #align is_open_map_of_add isOpenMap_ofAdd theorem isOpenMap_toAdd : IsOpenMap (toAdd : Multiplicative X → X) := IsOpenMap.id #align is_open_map_to_add isOpenMap_toAdd theorem isClosedMap_ofMul : IsClosedMap (ofMul : X → Additive X) := IsClosedMap.id #align is_closed_map_of_mul isClosedMap_ofMul theorem isClosedMap_toMul : IsClosedMap (toMul : Additive X → X) := IsClosedMap.id #align is_closed_map_to_mul isClosedMap_toMul theorem isClosedMap_ofAdd : IsClosedMap (ofAdd : X → Multiplicative X) := IsClosedMap.id #align is_closed_map_of_add isClosedMap_ofAdd theorem isClosedMap_toAdd : IsClosedMap (toAdd : Multiplicative X → X) := IsClosedMap.id #align is_closed_map_to_add isClosedMap_toAdd theorem nhds_ofMul (x : X) : 𝓝 (ofMul x) = map ofMul (𝓝 x) := rfl #align nhds_of_mul nhds_ofMul theorem nhds_ofAdd (x : X) : 𝓝 (ofAdd x) = map ofAdd (𝓝 x) := rfl #align nhds_of_add nhds_ofAdd theorem nhds_toMul (x : Additive X) : 𝓝 (toMul x) = map toMul (𝓝 x) := rfl #align nhds_to_mul nhds_toMul theorem nhds_toAdd (x : Multiplicative X) : 𝓝 (toAdd x) = map toAdd (𝓝 x) := rfl #align nhds_to_add nhds_toAdd end section variable [TopologicalSpace X] open OrderDual instance : TopologicalSpace Xᵒᵈ := ‹TopologicalSpace X› instance [DiscreteTopology X] : DiscreteTopology Xᵒᵈ := ‹DiscreteTopology X› theorem continuous_toDual : Continuous (toDual : X → Xᵒᵈ) := continuous_id #align continuous_to_dual continuous_toDual theorem continuous_ofDual : Continuous (ofDual : Xᵒᵈ → X) := continuous_id #align continuous_of_dual continuous_ofDual theorem isOpenMap_toDual : IsOpenMap (toDual : X → Xᵒᵈ) := IsOpenMap.id #align is_open_map_to_dual isOpenMap_toDual theorem isOpenMap_ofDual : IsOpenMap (ofDual : Xᵒᵈ → X) := IsOpenMap.id #align is_open_map_of_dual isOpenMap_ofDual theorem isClosedMap_toDual : IsClosedMap (toDual : X → Xᵒᵈ) := IsClosedMap.id #align is_closed_map_to_dual isClosedMap_toDual theorem isClosedMap_ofDual : IsClosedMap (ofDual : Xᵒᵈ → X) := IsClosedMap.id #align is_closed_map_of_dual isClosedMap_ofDual theorem nhds_toDual (x : X) : 𝓝 (toDual x) = map toDual (𝓝 x) := rfl #align nhds_to_dual nhds_toDual theorem nhds_ofDual (x : X) : 𝓝 (ofDual x) = map ofDual (𝓝 x) := rfl #align nhds_of_dual nhds_ofDual end theorem Quotient.preimage_mem_nhds [TopologicalSpace X] [s : Setoid X] {V : Set <\| Quotient s} {x : X} (hs : V ∈ 𝓝 (Quotient.mk' x)) : Quotient.mk' ⁻¹' V ∈ 𝓝 x := preimage_nhds_coinduced hs #align quotient.preimage_mem_nhds Quotient.preimage_mem_nhds theorem Dense.quotient [Setoid X] [TopologicalSpace X] {s : Set X} (H : Dense s) : Dense (Quotient.mk' '' s) := Quotient.surjective_Quotient_mk''.denseRange.dense_image continuous_coinduced_rng H #align dense.quotient Dense.quotient theorem DenseRange.quotient [Setoid X] [TopologicalSpace X] {f : Y → X} (hf : DenseRange f) : DenseRange (Quotient.mk' ∘ f) := Quotient.surjective_Quotient_mk''.denseRange.comp hf continuous_coinduced_rng #align dense_range.quotient DenseRange.quotient theorem continuous_map_of_le {α : Type} [TopologicalSpace α] {s t : Setoid α} (h : s ≤ t) : Continuous (Setoid.map_of_le h) := continuous_coinduced_rng theorem continuous_map_sInf {α : Type} [TopologicalSpace α] {S : Set (Setoid α)} {s : Setoid α} (h : s ∈ S) : Continuous (Setoid.map_sInf h) := continuous_coinduced_rng instance {p : X → Prop} [TopologicalSpace X] [DiscreteTopology X] : DiscreteTopology (Subtype p) := ⟨bot_unique fun s _ => ⟨(↑) '' s, isOpen_discrete _, preimage_image_eq _ Subtype.val_injective⟩⟩ instance Sum.discreteTopology [TopologicalSpace X] [TopologicalSpace Y] [h : DiscreteTopology X] [hY : DiscreteTopology Y] : DiscreteTopology (X ⊕ Y) := ⟨sup_eq_bot_iff.2 <\| by simp [h.eq_bot, hY.eq_bot]⟩ #align sum.discrete_topology Sum.discreteTopology instance Sigma.discreteTopology {ι : Type} {Y : ι → Type v} [∀ i, TopologicalSpace (Y i)] [h : ∀ i, DiscreteTopology (Y i)] : DiscreteTopology (Sigma Y) := ⟨iSup_eq_bot.2 fun _ => by simp only [(h _).eq_bot, coinduced_bot]⟩ #align sigma.discrete_topology Sigma.discreteTopology def CofiniteTopology (X : Type*) := X #align cofinite_topology CofiniteTopology section Subtype variable [TopologicalSpace X] [TopologicalSpace Y] [TopologicalSpace Z] {p : X → Prop} theorem inducing_subtype_val {t : Set Y} : Inducing ((↑) : t → Y) := ⟨rfl⟩ #align inducing_coe inducing_subtype_val theorem Inducing.of_codRestrict {f : X → Y} {t : Set Y} (ht : ∀ x, f x ∈ t) (h : Inducing (t.codRestrict f ht)) : Inducing f := inducing_subtype_val.comp h #align inducing.of_cod_restrict Inducing.of_codRestrict theorem embedding_subtype_val : Embedding ((↑) : Subtype p → X) := ⟨inducing_subtype_val, Subtype.coe_injective⟩ #align embedding_subtype_coe embedding_subtype_val theorem closedEmbedding_subtype_val (h : IsClosed { a \| p a }) : ClosedEmbedding ((↑) : Subtype p → X) := ⟨embedding_subtype_val, by rwa [Subtype.range_coe_subtype]⟩ #align closed_embedding_subtype_coe closedEmbedding_subtype_val @[continuity] theorem continuous_subtype_val : Continuous (@Subtype.val X p) := continuous_induced_dom #align continuous_subtype_val continuous_subtype_val #align continuous_subtype_coe continuous_subtype_val theorem Continuous.subtype_val {f : Y → Subtype p} (hf : Continuous f) : Continuous fun x => (f x : X) := continuous_subtype_val.comp hf #align continuous.subtype_coe Continuous.subtype_val theorem IsOpen.openEmbedding_subtype_val {s : Set X} (hs : IsOpen s) : OpenEmbedding ((↑) : s → X) := ⟨embedding_subtype_val, (@Subtype.range_coe _ s).symm ▸ hs⟩ #align is_open.open_embedding_subtype_coe IsOpen.openEmbedding_subtype_val theorem IsOpen.isOpenMap_subtype_val {s : Set X} (hs : IsOpen s) : IsOpenMap ((↑) : s → X) := hs.openEmbedding_subtype_val.isOpenMap #align is_open.is_open_map_subtype_coe IsOpen.isOpenMap_subtype_val theorem IsOpenMap.restrict {f : X → Y} (hf : IsOpenMap f) {s : Set X} (hs : IsOpen s) : IsOpenMap (s.restrict f) := hf.comp hs.isOpenMap_subtype_val #align is_open_map.restrict IsOpenMap.restrict nonrec theorem IsClosed.closedEmbedding_subtype_val {s : Set X} (hs : IsClosed s) : ClosedEmbedding ((↑) : s → X) := closedEmbedding_subtype_val hs #align is_closed.closed_embedding_subtype_coe IsClosed.closedEmbedding_subtype_val @[continuity] theorem Continuous.subtype_mk {f : Y → X} (h : Continuous f) (hp : ∀ x, p (f x)) : Continuous fun x => (⟨f x, hp x⟩ : Subtype p) := continuous_induced_rng.2 h #align continuous.subtype_mk Continuous.subtype_mk theorem Continuous.subtype_map {f : X → Y} (h : Continuous f) {q : Y → Prop} (hpq : ∀ x, p x → q (f x)) : Continuous (Subtype.map f hpq) := (h.comp continuous_subtype_val).subtype_mk _ #align continuous.subtype_map Continuous.subtype_map theorem continuous_inclusion {s t : Set X} (h : s ⊆ t) : Continuous (inclusion h) := continuous_id.subtype_map h #align continuous_inclusion continuous_inclusion theorem continuousAt_subtype_val {p : X → Prop} {x : Subtype p} : ContinuousAt ((↑) : Subtype p → X) x := continuous_subtype_val.continuousAt #align continuous_at_subtype_coe continuousAt_subtype_val theorem Subtype.dense_iff {s : Set X} {t : Set s} : Dense t ↔ s ⊆ closure ((↑) '' t) := by rw [inducing_subtype_val.dense_iff, SetCoe.forall] rfl #align subtype.dense_iff Subtype.dense_iff -- Porting note (#10756): new lemma	Mathlib/Topology/Constructions.lean	1,137	1,138	theorem map_nhds_subtype_val {s : Set X} (x : s) : map ((↑) : s → X) (𝓝 x) = 𝓝[s] ↑x := by	rw [inducing_subtype_val.map_nhds_eq, Subtype.range_val]
import Batteries.Data.Rat.Basic import Batteries.Tactic.SeqFocus namespace Rat theorem ext : {p q : Rat} → p.num = q.num → p.den = q.den → p = q \| ⟨_,_,_,_⟩, ⟨_,_,_,_⟩, rfl, rfl => rfl @[simp] theorem mk_den_one {r : Int} : ⟨r, 1, Nat.one_ne_zero, (Nat.coprime_one_right _)⟩ = (r : Rat) := rfl @[simp] theorem zero_num : (0 : Rat).num = 0 := rfl @[simp] theorem zero_den : (0 : Rat).den = 1 := rfl @[simp] theorem one_num : (1 : Rat).num = 1 := rfl @[simp] theorem one_den : (1 : Rat).den = 1 := rfl @[simp] theorem maybeNormalize_eq {num den g} (den_nz reduced) : maybeNormalize num den g den_nz reduced = { num := num.div g, den := den / g, den_nz, reduced } := by unfold maybeNormalize; split · subst g; simp · rfl theorem normalize.reduced' {num : Int} {den g : Nat} (den_nz : den ≠ 0) (e : g = num.natAbs.gcd den) : (num / g).natAbs.Coprime (den / g) := by rw [← Int.div_eq_ediv_of_dvd (e ▸ Int.ofNat_dvd_left.2 (Nat.gcd_dvd_left ..))] exact normalize.reduced den_nz e theorem normalize_eq {num den} (den_nz) : normalize num den den_nz = { num := num / num.natAbs.gcd den den := den / num.natAbs.gcd den den_nz := normalize.den_nz den_nz rfl reduced := normalize.reduced' den_nz rfl } := by simp only [normalize, maybeNormalize_eq, Int.div_eq_ediv_of_dvd (Int.ofNat_dvd_left.2 (Nat.gcd_dvd_left ..))] @[simp] theorem normalize_zero (nz) : normalize 0 d nz = 0 := by simp [normalize, Int.zero_div, Int.natAbs_zero, Nat.div_self (Nat.pos_of_ne_zero nz)]; rfl theorem mk_eq_normalize (num den nz c) : ⟨num, den, nz, c⟩ = normalize num den nz := by simp [normalize_eq, c.gcd_eq_one] theorem normalize_self (r : Rat) : normalize r.num r.den r.den_nz = r := (mk_eq_normalize ..).symm theorem normalize_mul_left {a : Nat} (d0 : d ≠ 0) (a0 : a ≠ 0) : normalize (↑a * n) (a * d) (Nat.mul_ne_zero a0 d0) = normalize n d d0 := by simp [normalize_eq, mk'.injEq, Int.natAbs_mul, Nat.gcd_mul_left, Nat.mul_div_mul_left _ _ (Nat.pos_of_ne_zero a0), Int.ofNat_mul, Int.mul_ediv_mul_of_pos _ _ (Int.ofNat_pos.2 <\| Nat.pos_of_ne_zero a0)] theorem normalize_mul_right {a : Nat} (d0 : d ≠ 0) (a0 : a ≠ 0) : normalize (n * a) (d * a) (Nat.mul_ne_zero d0 a0) = normalize n d d0 := by rw [← normalize_mul_left (d0 := d0) a0]; congr 1 <;> [apply Int.mul_comm; apply Nat.mul_comm] theorem normalize_eq_iff (z₁ : d₁ ≠ 0) (z₂ : d₂ ≠ 0) : normalize n₁ d₁ z₁ = normalize n₂ d₂ z₂ ↔ n₁ * d₂ = n₂ * d₁ := by constructor <;> intro h · simp only [normalize_eq, mk'.injEq] at h have' hn₁ := Int.ofNat_dvd_left.2 <\| Nat.gcd_dvd_left n₁.natAbs d₁ have' hn₂ := Int.ofNat_dvd_left.2 <\| Nat.gcd_dvd_left n₂.natAbs d₂ have' hd₁ := Int.ofNat_dvd.2 <\| Nat.gcd_dvd_right n₁.natAbs d₁ have' hd₂ := Int.ofNat_dvd.2 <\| Nat.gcd_dvd_right n₂.natAbs d₂ rw [← Int.ediv_mul_cancel (Int.dvd_trans hd₂ (Int.dvd_mul_left ..)), Int.mul_ediv_assoc _ hd₂, ← Int.ofNat_ediv, ← h.2, Int.ofNat_ediv, ← Int.mul_ediv_assoc _ hd₁, Int.mul_ediv_assoc' _ hn₁, Int.mul_right_comm, h.1, Int.ediv_mul_cancel hn₂] · rw [← normalize_mul_right _ z₂, ← normalize_mul_left z₂ z₁, Int.mul_comm d₁, h] theorem maybeNormalize_eq_normalize {num : Int} {den g : Nat} (den_nz reduced) (hn : ↑g ∣ num) (hd : g ∣ den) : maybeNormalize num den g den_nz reduced = normalize num den (mt (by simp [·]) den_nz) := by simp only [maybeNormalize_eq, mk_eq_normalize, Int.div_eq_ediv_of_dvd hn] have : g ≠ 0 := mt (by simp [·]) den_nz rw [← normalize_mul_right _ this, Int.ediv_mul_cancel hn] congr 1; exact Nat.div_mul_cancel hd @[simp] theorem normalize_eq_zero (d0 : d ≠ 0) : normalize n d d0 = 0 ↔ n = 0 := by have' := normalize_eq_iff d0 Nat.one_ne_zero rw [normalize_zero (d := 1)] at this; rw [this]; simp theorem normalize_num_den' (num den nz) : ∃ d : Nat, d ≠ 0 ∧ num = (normalize num den nz).num * d ∧ den = (normalize num den nz).den * d := by refine ⟨num.natAbs.gcd den, Nat.gcd_ne_zero_right nz, ?_⟩ simp [normalize_eq, Int.ediv_mul_cancel (Int.ofNat_dvd_left.2 <\| Nat.gcd_dvd_left ..), Nat.div_mul_cancel (Nat.gcd_dvd_right ..)] theorem normalize_num_den (h : normalize n d z = ⟨n', d', z', c⟩) : ∃ m : Nat, m ≠ 0 ∧ n = n' * m ∧ d = d' * m := by have := normalize_num_den' n d z; rwa [h] at this theorem normalize_eq_mkRat {num den} (den_nz) : normalize num den den_nz = mkRat num den := by simp [mkRat, den_nz] theorem mkRat_num_den (z : d ≠ 0) (h : mkRat n d = ⟨n', d', z', c⟩) : ∃ m : Nat, m ≠ 0 ∧ n = n' * m ∧ d = d' * m := normalize_num_den ((normalize_eq_mkRat z).symm ▸ h) theorem mkRat_def (n d) : mkRat n d = if d0 : d = 0 then 0 else normalize n d d0 := rfl theorem mkRat_self (a : Rat) : mkRat a.num a.den = a := by rw [← normalize_eq_mkRat a.den_nz, normalize_self] theorem mk_eq_mkRat (num den nz c) : ⟨num, den, nz, c⟩ = mkRat num den := by simp [mk_eq_normalize, normalize_eq_mkRat] @[simp] theorem zero_mkRat (n) : mkRat 0 n = 0 := by simp [mkRat_def] @[simp] theorem mkRat_zero (n) : mkRat n 0 = 0 := by simp [mkRat_def] theorem mkRat_eq_zero (d0 : d ≠ 0) : mkRat n d = 0 ↔ n = 0 := by simp [mkRat_def, d0] theorem mkRat_ne_zero (d0 : d ≠ 0) : mkRat n d ≠ 0 ↔ n ≠ 0 := not_congr (mkRat_eq_zero d0) theorem mkRat_mul_left {a : Nat} (a0 : a ≠ 0) : mkRat (↑a * n) (a * d) = mkRat n d := by if d0 : d = 0 then simp [d0] else rw [← normalize_eq_mkRat d0, ← normalize_mul_left d0 a0, normalize_eq_mkRat] theorem mkRat_mul_right {a : Nat} (a0 : a ≠ 0) : mkRat (n * a) (d * a) = mkRat n d := by rw [← mkRat_mul_left (d := d) a0]; congr 1 <;> [apply Int.mul_comm; apply Nat.mul_comm] theorem mkRat_eq_iff (z₁ : d₁ ≠ 0) (z₂ : d₂ ≠ 0) : mkRat n₁ d₁ = mkRat n₂ d₂ ↔ n₁ * d₂ = n₂ * d₁ := by rw [← normalize_eq_mkRat z₁, ← normalize_eq_mkRat z₂, normalize_eq_iff] @[simp] theorem divInt_ofNat (num den) : num /. (den : Nat) = mkRat num den := by simp [divInt, normalize_eq_mkRat] theorem mk_eq_divInt (num den nz c) : ⟨num, den, nz, c⟩ = num /. (den : Nat) := by simp [mk_eq_mkRat] theorem divInt_self (a : Rat) : a.num /. a.den = a := by rw [divInt_ofNat, mkRat_self] @[simp] theorem zero_divInt (n) : 0 /. n = 0 := by cases n <;> simp [divInt] @[simp] theorem divInt_zero (n) : n /. 0 = 0 := mkRat_zero n theorem neg_divInt_neg (num den) : -num /. -den = num /. den := by match den with \| Nat.succ n => simp only [divInt, Int.neg_ofNat_succ] simp [normalize_eq_mkRat, Int.neg_neg] \| 0 => rfl \| Int.negSucc n => simp only [divInt, Int.neg_negSucc] simp [normalize_eq_mkRat, Int.neg_neg] theorem divInt_neg' (num den) : num /. -den = -num /. den := by rw [← neg_divInt_neg, Int.neg_neg] theorem divInt_eq_iff (z₁ : d₁ ≠ 0) (z₂ : d₂ ≠ 0) : n₁ /. d₁ = n₂ /. d₂ ↔ n₁ * d₂ = n₂ * d₁ := by rcases Int.eq_nat_or_neg d₁ with ⟨_, rfl \| rfl⟩ <;> rcases Int.eq_nat_or_neg d₂ with ⟨_, rfl \| rfl⟩ <;> simp_all [divInt_neg', Int.ofNat_eq_zero, Int.neg_eq_zero, mkRat_eq_iff, Int.neg_mul, Int.mul_neg, Int.eq_neg_comm, eq_comm] theorem divInt_mul_left {a : Int} (a0 : a ≠ 0) : (a * n) /. (a * d) = n /. d := by if d0 : d = 0 then simp [d0] else simp [divInt_eq_iff (Int.mul_ne_zero a0 d0) d0, Int.mul_assoc, Int.mul_left_comm] theorem divInt_mul_right {a : Int} (a0 : a ≠ 0) : (n * a) /. (d * a) = n /. d := by simp [← divInt_mul_left (d := d) a0, Int.mul_comm] theorem divInt_num_den (z : d ≠ 0) (h : n /. d = ⟨n', d', z', c⟩) : ∃ m, m ≠ 0 ∧ n = n' * m ∧ d = d' * m := by rcases Int.eq_nat_or_neg d with ⟨_, rfl \| rfl⟩ <;> simp_all [divInt_neg', Int.ofNat_eq_zero, Int.neg_eq_zero] · have ⟨m, h₁, h₂⟩ := mkRat_num_den z h; exists m simp [Int.ofNat_eq_zero, Int.ofNat_mul, h₁, h₂] · have ⟨m, h₁, h₂⟩ := mkRat_num_den z h; exists -m rw [← Int.neg_inj, Int.neg_neg] at h₂ simp [Int.ofNat_eq_zero, Int.ofNat_mul, h₁, h₂, Int.mul_neg, Int.neg_eq_zero] @[simp] theorem ofInt_ofNat : ofInt (OfNat.ofNat n) = OfNat.ofNat n := rfl @[simp] theorem ofInt_num : (ofInt n : Rat).num = n := rfl @[simp] theorem ofInt_den : (ofInt n : Rat).den = 1 := rfl @[simp] theorem ofNat_num : (OfNat.ofNat n : Rat).num = OfNat.ofNat n := rfl @[simp] theorem ofNat_den : (OfNat.ofNat n : Rat).den = 1 := rfl theorem add_def (a b : Rat) : a + b = normalize (a.num * b.den + b.num * a.den) (a.den * b.den) (Nat.mul_ne_zero a.den_nz b.den_nz) := by show Rat.add .. = _; delta Rat.add; dsimp only; split · exact (normalize_self _).symm · have : a.den.gcd b.den ≠ 0 := Nat.gcd_ne_zero_left a.den_nz rw [maybeNormalize_eq_normalize _ _ (Int.ofNat_dvd_left.2 <\| Nat.gcd_dvd_left ..) (Nat.dvd_trans (Nat.gcd_dvd_right ..) <\| Nat.dvd_trans (Nat.gcd_dvd_right ..) (Nat.dvd_mul_left ..)), ← normalize_mul_right _ this]; congr 1 · simp only [Int.add_mul, Int.mul_assoc, Int.ofNat_mul_ofNat, Nat.div_mul_cancel (Nat.gcd_dvd_left ..), Nat.div_mul_cancel (Nat.gcd_dvd_right ..)] · rw [Nat.mul_right_comm, Nat.div_mul_cancel (Nat.gcd_dvd_left ..)] theorem add_def' (a b : Rat) : a + b = mkRat (a.num * b.den + b.num * a.den) (a.den * b.den) := by rw [add_def, normalize_eq_mkRat] theorem normalize_add_normalize (n₁ n₂) {d₁ d₂} (z₁ z₂) : normalize n₁ d₁ z₁ + normalize n₂ d₂ z₂ = normalize (n₁ * d₂ + n₂ * d₁) (d₁ * d₂) (Nat.mul_ne_zero z₁ z₂) := by cases e₁ : normalize n₁ d₁ z₁; rcases normalize_num_den e₁ with ⟨g₁, zg₁, rfl, rfl⟩ cases e₂ : normalize n₂ d₂ z₂; rcases normalize_num_den e₂ with ⟨g₂, zg₂, rfl, rfl⟩ simp only [add_def]; rw [← normalize_mul_right _ (Nat.mul_ne_zero zg₁ zg₂)]; congr 1 · rw [Int.add_mul]; simp [Int.ofNat_mul, Int.mul_assoc, Int.mul_left_comm, Int.mul_comm] · simp [Nat.mul_left_comm, Nat.mul_comm] theorem mkRat_add_mkRat (n₁ n₂ : Int) {d₁ d₂} (z₁ : d₁ ≠ 0) (z₂ : d₂ ≠ 0) : mkRat n₁ d₁ + mkRat n₂ d₂ = mkRat (n₁ * d₂ + n₂ * d₁) (d₁ * d₂) := by rw [← normalize_eq_mkRat z₁, ← normalize_eq_mkRat z₂, normalize_add_normalize, normalize_eq_mkRat] theorem divInt_add_divInt (n₁ n₂ : Int) {d₁ d₂} (z₁ : d₁ ≠ 0) (z₂ : d₂ ≠ 0) : n₁ /. d₁ + n₂ /. d₂ = (n₁ * d₂ + n₂ * d₁) /. (d₁ * d₂) := by rcases Int.eq_nat_or_neg d₁ with ⟨_, rfl \| rfl⟩ <;> rcases Int.eq_nat_or_neg d₂ with ⟨_, rfl \| rfl⟩ <;> simp_all [-Int.natCast_mul, Int.ofNat_eq_zero, Int.neg_eq_zero, divInt_neg', Int.mul_neg, Int.ofNat_mul_ofNat, Int.neg_add, Int.neg_mul, mkRat_add_mkRat] @[simp] theorem neg_num (a : Rat) : (-a).num = -a.num := rfl @[simp] theorem neg_den (a : Rat) : (-a).den = a.den := rfl theorem neg_normalize (n d z) : -normalize n d z = normalize (-n) d z := by simp [normalize]; rfl theorem neg_mkRat (n d) : -mkRat n d = mkRat (-n) d := by if z : d = 0 then simp [z]; rfl else simp [← normalize_eq_mkRat z, neg_normalize] theorem neg_divInt (n d) : -(n /. d) = -n /. d := by rcases Int.eq_nat_or_neg d with ⟨_, rfl \| rfl⟩ <;> simp [divInt_neg', neg_mkRat] theorem sub_def (a b : Rat) : a - b = normalize (a.num * b.den - b.num * a.den) (a.den * b.den) (Nat.mul_ne_zero a.den_nz b.den_nz) := by show Rat.sub .. = _; delta Rat.sub; dsimp only; split · exact (normalize_self _).symm · have : a.den.gcd b.den ≠ 0 := Nat.gcd_ne_zero_left a.den_nz rw [maybeNormalize_eq_normalize _ _ (Int.ofNat_dvd_left.2 <\| Nat.gcd_dvd_left ..) (Nat.dvd_trans (Nat.gcd_dvd_right ..) <\| Nat.dvd_trans (Nat.gcd_dvd_right ..) (Nat.dvd_mul_left ..)), ← normalize_mul_right _ this]; congr 1 · simp only [Int.sub_mul, Int.mul_assoc, Int.ofNat_mul_ofNat, Nat.div_mul_cancel (Nat.gcd_dvd_left ..), Nat.div_mul_cancel (Nat.gcd_dvd_right ..)] · rw [Nat.mul_right_comm, Nat.div_mul_cancel (Nat.gcd_dvd_left ..)] theorem sub_def' (a b : Rat) : a - b = mkRat (a.num * b.den - b.num * a.den) (a.den * b.den) := by rw [sub_def, normalize_eq_mkRat] protected theorem sub_eq_add_neg (a b : Rat) : a - b = a + -b := by simp [add_def, sub_def, Int.neg_mul, Int.sub_eq_add_neg] theorem divInt_sub_divInt (n₁ n₂ : Int) {d₁ d₂} (z₁ : d₁ ≠ 0) (z₂ : d₂ ≠ 0) : n₁ /. d₁ - n₂ /. d₂ = (n₁ * d₂ - n₂ * d₁) /. (d₁ * d₂) := by simp only [Rat.sub_eq_add_neg, neg_divInt, divInt_add_divInt _ _ z₁ z₂, Int.neg_mul, Int.sub_eq_add_neg] theorem mul_def (a b : Rat) : a * b = normalize (a.num * b.num) (a.den * b.den) (Nat.mul_ne_zero a.den_nz b.den_nz) := by show Rat.mul .. = _; delta Rat.mul; dsimp only have H1 : a.num.natAbs.gcd b.den ≠ 0 := Nat.gcd_ne_zero_right b.den_nz have H2 : b.num.natAbs.gcd a.den ≠ 0 := Nat.gcd_ne_zero_right a.den_nz rw [mk_eq_normalize, ← normalize_mul_right _ (Nat.mul_ne_zero H1 H2)]; congr 1 · rw [Int.ofNat_mul, ← Int.mul_assoc, Int.mul_right_comm (Int.div ..), Int.div_mul_cancel (Int.ofNat_dvd_left.2 <\| Nat.gcd_dvd_left ..), Int.mul_assoc, Int.div_mul_cancel (Int.ofNat_dvd_left.2 <\| Nat.gcd_dvd_left ..)] · rw [← Nat.mul_assoc, Nat.mul_right_comm, Nat.mul_right_comm (_/_), Nat.div_mul_cancel (Nat.gcd_dvd_right ..), Nat.mul_assoc, Nat.div_mul_cancel (Nat.gcd_dvd_right ..)] protected theorem mul_comm (a b : Rat) : a * b = b * a := by simp [mul_def, normalize_eq_mkRat, Int.mul_comm, Nat.mul_comm] @[simp] protected theorem zero_mul (a : Rat) : 0 * a = 0 := by simp [mul_def] @[simp] protected theorem mul_zero (a : Rat) : a * 0 = 0 := by simp [mul_def] @[simp] protected theorem one_mul (a : Rat) : 1 * a = a := by simp [mul_def, normalize_self] @[simp] protected theorem mul_one (a : Rat) : a * 1 = a := by simp [mul_def, normalize_self] theorem normalize_mul_normalize (n₁ n₂) {d₁ d₂} (z₁ z₂) : normalize n₁ d₁ z₁ * normalize n₂ d₂ z₂ = normalize (n₁ * n₂) (d₁ * d₂) (Nat.mul_ne_zero z₁ z₂) := by cases e₁ : normalize n₁ d₁ z₁; rcases normalize_num_den e₁ with ⟨g₁, zg₁, rfl, rfl⟩ cases e₂ : normalize n₂ d₂ z₂; rcases normalize_num_den e₂ with ⟨g₂, zg₂, rfl, rfl⟩ simp only [mul_def]; rw [← normalize_mul_right _ (Nat.mul_ne_zero zg₁ zg₂)]; congr 1 · simp [Int.ofNat_mul, Int.mul_assoc, Int.mul_left_comm] · simp [Nat.mul_left_comm, Nat.mul_comm] theorem mkRat_mul_mkRat (n₁ n₂ : Int) (d₁ d₂) : mkRat n₁ d₁ * mkRat n₂ d₂ = mkRat (n₁ * n₂) (d₁ * d₂) := by if z₁ : d₁ = 0 then simp [z₁] else if z₂ : d₂ = 0 then simp [z₂] else rw [← normalize_eq_mkRat z₁, ← normalize_eq_mkRat z₂, normalize_mul_normalize, normalize_eq_mkRat]	.lake/packages/batteries/Batteries/Data/Rat/Lemmas.lean	299	304	theorem divInt_mul_divInt (n₁ n₂ : Int) {d₁ d₂} (z₁ : d₁ ≠ 0) (z₂ : d₂ ≠ 0) : (n₁ /. d₁) * (n₂ /. d₂) = (n₁ * n₂) /. (d₁ * d₂) := by	rcases Int.eq_nat_or_neg d₁ with ⟨_, rfl \| rfl⟩ <;> rcases Int.eq_nat_or_neg d₂ with ⟨_, rfl \| rfl⟩ <;> simp_all [-Int.natCast_mul, divInt_neg', Int.mul_neg, Int.ofNat_mul_ofNat, Int.neg_mul, mkRat_mul_mkRat]
import Mathlib.Analysis.InnerProductSpace.TwoDim import Mathlib.Geometry.Euclidean.Angle.Unoriented.Basic #align_import geometry.euclidean.angle.oriented.basic from "leanprover-community/mathlib"@"f0c8bf9245297a541f468be517f1bde6195105e9" noncomputable section open FiniteDimensional Complex open scoped Real RealInnerProductSpace ComplexConjugate namespace Orientation attribute [local instance] Complex.finrank_real_complex_fact variable {V V' : Type} variable [NormedAddCommGroup V] [NormedAddCommGroup V'] variable [InnerProductSpace ℝ V] [InnerProductSpace ℝ V'] variable [Fact (finrank ℝ V = 2)] [Fact (finrank ℝ V' = 2)] (o : Orientation ℝ V (Fin 2)) local notation "ω" => o.areaForm def oangle (x y : V) : Real.Angle := Complex.arg (o.kahler x y) #align orientation.oangle Orientation.oangle theorem continuousAt_oangle {x : V × V} (hx1 : x.1 ≠ 0) (hx2 : x.2 ≠ 0) : ContinuousAt (fun y : V × V => o.oangle y.1 y.2) x := by refine (Complex.continuousAt_arg_coe_angle ?_).comp ?_ · exact o.kahler_ne_zero hx1 hx2 exact ((continuous_ofReal.comp continuous_inner).add ((continuous_ofReal.comp o.areaForm'.continuous₂).mul continuous_const)).continuousAt #align orientation.continuous_at_oangle Orientation.continuousAt_oangle @[simp] theorem oangle_zero_left (x : V) : o.oangle 0 x = 0 := by simp [oangle] #align orientation.oangle_zero_left Orientation.oangle_zero_left @[simp] theorem oangle_zero_right (x : V) : o.oangle x 0 = 0 := by simp [oangle] #align orientation.oangle_zero_right Orientation.oangle_zero_right @[simp] theorem oangle_self (x : V) : o.oangle x x = 0 := by rw [oangle, kahler_apply_self, ← ofReal_pow] convert QuotientAddGroup.mk_zero (AddSubgroup.zmultiples (2 π)) apply arg_ofReal_of_nonneg positivity #align orientation.oangle_self Orientation.oangle_self theorem left_ne_zero_of_oangle_ne_zero {x y : V} (h : o.oangle x y ≠ 0) : x ≠ 0 := by rintro rfl; simp at h #align orientation.left_ne_zero_of_oangle_ne_zero Orientation.left_ne_zero_of_oangle_ne_zero theorem right_ne_zero_of_oangle_ne_zero {x y : V} (h : o.oangle x y ≠ 0) : y ≠ 0 := by rintro rfl; simp at h #align orientation.right_ne_zero_of_oangle_ne_zero Orientation.right_ne_zero_of_oangle_ne_zero theorem ne_of_oangle_ne_zero {x y : V} (h : o.oangle x y ≠ 0) : x ≠ y := by rintro rfl; simp at h #align orientation.ne_of_oangle_ne_zero Orientation.ne_of_oangle_ne_zero theorem left_ne_zero_of_oangle_eq_pi {x y : V} (h : o.oangle x y = π) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : o.oangle x y ≠ 0) #align orientation.left_ne_zero_of_oangle_eq_pi Orientation.left_ne_zero_of_oangle_eq_pi theorem right_ne_zero_of_oangle_eq_pi {x y : V} (h : o.oangle x y = π) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : o.oangle x y ≠ 0) #align orientation.right_ne_zero_of_oangle_eq_pi Orientation.right_ne_zero_of_oangle_eq_pi theorem ne_of_oangle_eq_pi {x y : V} (h : o.oangle x y = π) : x ≠ y := o.ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : o.oangle x y ≠ 0) #align orientation.ne_of_oangle_eq_pi Orientation.ne_of_oangle_eq_pi theorem left_ne_zero_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = (π / 2 : ℝ)) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.left_ne_zero_of_oangle_eq_pi_div_two Orientation.left_ne_zero_of_oangle_eq_pi_div_two theorem right_ne_zero_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = (π / 2 : ℝ)) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.right_ne_zero_of_oangle_eq_pi_div_two Orientation.right_ne_zero_of_oangle_eq_pi_div_two theorem ne_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = (π / 2 : ℝ)) : x ≠ y := o.ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.ne_of_oangle_eq_pi_div_two Orientation.ne_of_oangle_eq_pi_div_two theorem left_ne_zero_of_oangle_eq_neg_pi_div_two {x y : V} (h : o.oangle x y = (-π / 2 : ℝ)) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.left_ne_zero_of_oangle_eq_neg_pi_div_two Orientation.left_ne_zero_of_oangle_eq_neg_pi_div_two theorem right_ne_zero_of_oangle_eq_neg_pi_div_two {x y : V} (h : o.oangle x y = (-π / 2 : ℝ)) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.right_ne_zero_of_oangle_eq_neg_pi_div_two Orientation.right_ne_zero_of_oangle_eq_neg_pi_div_two theorem ne_of_oangle_eq_neg_pi_div_two {x y : V} (h : o.oangle x y = (-π / 2 : ℝ)) : x ≠ y := o.ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.ne_of_oangle_eq_neg_pi_div_two Orientation.ne_of_oangle_eq_neg_pi_div_two theorem left_ne_zero_of_oangle_sign_ne_zero {x y : V} (h : (o.oangle x y).sign ≠ 0) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 #align orientation.left_ne_zero_of_oangle_sign_ne_zero Orientation.left_ne_zero_of_oangle_sign_ne_zero theorem right_ne_zero_of_oangle_sign_ne_zero {x y : V} (h : (o.oangle x y).sign ≠ 0) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 #align orientation.right_ne_zero_of_oangle_sign_ne_zero Orientation.right_ne_zero_of_oangle_sign_ne_zero theorem ne_of_oangle_sign_ne_zero {x y : V} (h : (o.oangle x y).sign ≠ 0) : x ≠ y := o.ne_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 #align orientation.ne_of_oangle_sign_ne_zero Orientation.ne_of_oangle_sign_ne_zero theorem left_ne_zero_of_oangle_sign_eq_one {x y : V} (h : (o.oangle x y).sign = 1) : x ≠ 0 := o.left_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.left_ne_zero_of_oangle_sign_eq_one Orientation.left_ne_zero_of_oangle_sign_eq_one theorem right_ne_zero_of_oangle_sign_eq_one {x y : V} (h : (o.oangle x y).sign = 1) : y ≠ 0 := o.right_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.right_ne_zero_of_oangle_sign_eq_one Orientation.right_ne_zero_of_oangle_sign_eq_one theorem ne_of_oangle_sign_eq_one {x y : V} (h : (o.oangle x y).sign = 1) : x ≠ y := o.ne_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.ne_of_oangle_sign_eq_one Orientation.ne_of_oangle_sign_eq_one theorem left_ne_zero_of_oangle_sign_eq_neg_one {x y : V} (h : (o.oangle x y).sign = -1) : x ≠ 0 := o.left_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.left_ne_zero_of_oangle_sign_eq_neg_one Orientation.left_ne_zero_of_oangle_sign_eq_neg_one theorem right_ne_zero_of_oangle_sign_eq_neg_one {x y : V} (h : (o.oangle x y).sign = -1) : y ≠ 0 := o.right_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.right_ne_zero_of_oangle_sign_eq_neg_one Orientation.right_ne_zero_of_oangle_sign_eq_neg_one theorem ne_of_oangle_sign_eq_neg_one {x y : V} (h : (o.oangle x y).sign = -1) : x ≠ y := o.ne_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.ne_of_oangle_sign_eq_neg_one Orientation.ne_of_oangle_sign_eq_neg_one theorem oangle_rev (x y : V) : o.oangle y x = -o.oangle x y := by simp only [oangle, o.kahler_swap y x, Complex.arg_conj_coe_angle] #align orientation.oangle_rev Orientation.oangle_rev @[simp] theorem oangle_add_oangle_rev (x y : V) : o.oangle x y + o.oangle y x = 0 := by simp [o.oangle_rev y x] #align orientation.oangle_add_oangle_rev Orientation.oangle_add_oangle_rev theorem oangle_neg_left {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : o.oangle (-x) y = o.oangle x y + π := by simp only [oangle, map_neg] convert Complex.arg_neg_coe_angle _ exact o.kahler_ne_zero hx hy #align orientation.oangle_neg_left Orientation.oangle_neg_left theorem oangle_neg_right {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : o.oangle x (-y) = o.oangle x y + π := by simp only [oangle, map_neg] convert Complex.arg_neg_coe_angle _ exact o.kahler_ne_zero hx hy #align orientation.oangle_neg_right Orientation.oangle_neg_right @[simp] theorem two_zsmul_oangle_neg_left (x y : V) : (2 : ℤ) • o.oangle (-x) y = (2 : ℤ) • o.oangle x y := by by_cases hx : x = 0 · simp [hx] · by_cases hy : y = 0 · simp [hy] · simp [o.oangle_neg_left hx hy] #align orientation.two_zsmul_oangle_neg_left Orientation.two_zsmul_oangle_neg_left @[simp] theorem two_zsmul_oangle_neg_right (x y : V) : (2 : ℤ) • o.oangle x (-y) = (2 : ℤ) • o.oangle x y := by by_cases hx : x = 0 · simp [hx] · by_cases hy : y = 0 · simp [hy] · simp [o.oangle_neg_right hx hy] #align orientation.two_zsmul_oangle_neg_right Orientation.two_zsmul_oangle_neg_right @[simp] theorem oangle_neg_neg (x y : V) : o.oangle (-x) (-y) = o.oangle x y := by simp [oangle] #align orientation.oangle_neg_neg Orientation.oangle_neg_neg theorem oangle_neg_left_eq_neg_right (x y : V) : o.oangle (-x) y = o.oangle x (-y) := by rw [← neg_neg y, oangle_neg_neg, neg_neg] #align orientation.oangle_neg_left_eq_neg_right Orientation.oangle_neg_left_eq_neg_right @[simp] theorem oangle_neg_self_left {x : V} (hx : x ≠ 0) : o.oangle (-x) x = π := by simp [oangle_neg_left, hx] #align orientation.oangle_neg_self_left Orientation.oangle_neg_self_left @[simp] theorem oangle_neg_self_right {x : V} (hx : x ≠ 0) : o.oangle x (-x) = π := by simp [oangle_neg_right, hx] #align orientation.oangle_neg_self_right Orientation.oangle_neg_self_right -- @[simp] -- Porting note (#10618): simp can prove this theorem two_zsmul_oangle_neg_self_left (x : V) : (2 : ℤ) • o.oangle (-x) x = 0 := by by_cases hx : x = 0 <;> simp [hx] #align orientation.two_zsmul_oangle_neg_self_left Orientation.two_zsmul_oangle_neg_self_left -- @[simp] -- Porting note (#10618): simp can prove this theorem two_zsmul_oangle_neg_self_right (x : V) : (2 : ℤ) • o.oangle x (-x) = 0 := by by_cases hx : x = 0 <;> simp [hx] #align orientation.two_zsmul_oangle_neg_self_right Orientation.two_zsmul_oangle_neg_self_right @[simp] theorem oangle_add_oangle_rev_neg_left (x y : V) : o.oangle (-x) y + o.oangle (-y) x = 0 := by rw [oangle_neg_left_eq_neg_right, oangle_rev, add_left_neg] #align orientation.oangle_add_oangle_rev_neg_left Orientation.oangle_add_oangle_rev_neg_left @[simp] theorem oangle_add_oangle_rev_neg_right (x y : V) : o.oangle x (-y) + o.oangle y (-x) = 0 := by rw [o.oangle_rev (-x), oangle_neg_left_eq_neg_right, add_neg_self] #align orientation.oangle_add_oangle_rev_neg_right Orientation.oangle_add_oangle_rev_neg_right @[simp] theorem oangle_smul_left_of_pos (x y : V) {r : ℝ} (hr : 0 < r) : o.oangle (r • x) y = o.oangle x y := by simp [oangle, Complex.arg_real_mul _ hr] #align orientation.oangle_smul_left_of_pos Orientation.oangle_smul_left_of_pos @[simp] theorem oangle_smul_right_of_pos (x y : V) {r : ℝ} (hr : 0 < r) : o.oangle x (r • y) = o.oangle x y := by simp [oangle, Complex.arg_real_mul _ hr] #align orientation.oangle_smul_right_of_pos Orientation.oangle_smul_right_of_pos @[simp] theorem oangle_smul_left_of_neg (x y : V) {r : ℝ} (hr : r < 0) : o.oangle (r • x) y = o.oangle (-x) y := by rw [← neg_neg r, neg_smul, ← smul_neg, o.oangle_smul_left_of_pos _ _ (neg_pos_of_neg hr)] #align orientation.oangle_smul_left_of_neg Orientation.oangle_smul_left_of_neg @[simp] theorem oangle_smul_right_of_neg (x y : V) {r : ℝ} (hr : r < 0) : o.oangle x (r • y) = o.oangle x (-y) := by rw [← neg_neg r, neg_smul, ← smul_neg, o.oangle_smul_right_of_pos _ _ (neg_pos_of_neg hr)] #align orientation.oangle_smul_right_of_neg Orientation.oangle_smul_right_of_neg @[simp] theorem oangle_smul_left_self_of_nonneg (x : V) {r : ℝ} (hr : 0 ≤ r) : o.oangle (r • x) x = 0 := by rcases hr.lt_or_eq with (h \| h) · simp [h] · simp [h.symm] #align orientation.oangle_smul_left_self_of_nonneg Orientation.oangle_smul_left_self_of_nonneg @[simp] theorem oangle_smul_right_self_of_nonneg (x : V) {r : ℝ} (hr : 0 ≤ r) : o.oangle x (r • x) = 0 := by rcases hr.lt_or_eq with (h \| h) · simp [h] · simp [h.symm] #align orientation.oangle_smul_right_self_of_nonneg Orientation.oangle_smul_right_self_of_nonneg @[simp] theorem oangle_smul_smul_self_of_nonneg (x : V) {r₁ r₂ : ℝ} (hr₁ : 0 ≤ r₁) (hr₂ : 0 ≤ r₂) : o.oangle (r₁ • x) (r₂ • x) = 0 := by rcases hr₁.lt_or_eq with (h \| h) · simp [h, hr₂] · simp [h.symm] #align orientation.oangle_smul_smul_self_of_nonneg Orientation.oangle_smul_smul_self_of_nonneg @[simp] theorem two_zsmul_oangle_smul_left_of_ne_zero (x y : V) {r : ℝ} (hr : r ≠ 0) : (2 : ℤ) • o.oangle (r • x) y = (2 : ℤ) • o.oangle x y := by rcases hr.lt_or_lt with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_left_of_ne_zero Orientation.two_zsmul_oangle_smul_left_of_ne_zero @[simp] theorem two_zsmul_oangle_smul_right_of_ne_zero (x y : V) {r : ℝ} (hr : r ≠ 0) : (2 : ℤ) • o.oangle x (r • y) = (2 : ℤ) • o.oangle x y := by rcases hr.lt_or_lt with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_right_of_ne_zero Orientation.two_zsmul_oangle_smul_right_of_ne_zero @[simp] theorem two_zsmul_oangle_smul_left_self (x : V) {r : ℝ} : (2 : ℤ) • o.oangle (r • x) x = 0 := by rcases lt_or_le r 0 with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_left_self Orientation.two_zsmul_oangle_smul_left_self @[simp] theorem two_zsmul_oangle_smul_right_self (x : V) {r : ℝ} : (2 : ℤ) • o.oangle x (r • x) = 0 := by rcases lt_or_le r 0 with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_right_self Orientation.two_zsmul_oangle_smul_right_self @[simp] theorem two_zsmul_oangle_smul_smul_self (x : V) {r₁ r₂ : ℝ} : (2 : ℤ) • o.oangle (r₁ • x) (r₂ • x) = 0 := by by_cases h : r₁ = 0 <;> simp [h] #align orientation.two_zsmul_oangle_smul_smul_self Orientation.two_zsmul_oangle_smul_smul_self theorem two_zsmul_oangle_left_of_span_eq {x y : V} (z : V) (h : (ℝ ∙ x) = ℝ ∙ y) : (2 : ℤ) • o.oangle x z = (2 : ℤ) • o.oangle y z := by rw [Submodule.span_singleton_eq_span_singleton] at h rcases h with ⟨r, rfl⟩ exact (o.two_zsmul_oangle_smul_left_of_ne_zero _ _ (Units.ne_zero _)).symm #align orientation.two_zsmul_oangle_left_of_span_eq Orientation.two_zsmul_oangle_left_of_span_eq theorem two_zsmul_oangle_right_of_span_eq (x : V) {y z : V} (h : (ℝ ∙ y) = ℝ ∙ z) : (2 : ℤ) • o.oangle x y = (2 : ℤ) • o.oangle x z := by rw [Submodule.span_singleton_eq_span_singleton] at h rcases h with ⟨r, rfl⟩ exact (o.two_zsmul_oangle_smul_right_of_ne_zero _ _ (Units.ne_zero _)).symm #align orientation.two_zsmul_oangle_right_of_span_eq Orientation.two_zsmul_oangle_right_of_span_eq theorem two_zsmul_oangle_of_span_eq_of_span_eq {w x y z : V} (hwx : (ℝ ∙ w) = ℝ ∙ x) (hyz : (ℝ ∙ y) = ℝ ∙ z) : (2 : ℤ) • o.oangle w y = (2 : ℤ) • o.oangle x z := by rw [o.two_zsmul_oangle_left_of_span_eq y hwx, o.two_zsmul_oangle_right_of_span_eq x hyz] #align orientation.two_zsmul_oangle_of_span_eq_of_span_eq Orientation.two_zsmul_oangle_of_span_eq_of_span_eq theorem oangle_eq_zero_iff_oangle_rev_eq_zero {x y : V} : o.oangle x y = 0 ↔ o.oangle y x = 0 := by rw [oangle_rev, neg_eq_zero] #align orientation.oangle_eq_zero_iff_oangle_rev_eq_zero Orientation.oangle_eq_zero_iff_oangle_rev_eq_zero theorem oangle_eq_zero_iff_sameRay {x y : V} : o.oangle x y = 0 ↔ SameRay ℝ x y := by rw [oangle, kahler_apply_apply, Complex.arg_coe_angle_eq_iff_eq_toReal, Real.Angle.toReal_zero, Complex.arg_eq_zero_iff] simpa using o.nonneg_inner_and_areaForm_eq_zero_iff_sameRay x y #align orientation.oangle_eq_zero_iff_same_ray Orientation.oangle_eq_zero_iff_sameRay theorem oangle_eq_pi_iff_oangle_rev_eq_pi {x y : V} : o.oangle x y = π ↔ o.oangle y x = π := by rw [oangle_rev, neg_eq_iff_eq_neg, Real.Angle.neg_coe_pi] #align orientation.oangle_eq_pi_iff_oangle_rev_eq_pi Orientation.oangle_eq_pi_iff_oangle_rev_eq_pi theorem oangle_eq_pi_iff_sameRay_neg {x y : V} : o.oangle x y = π ↔ x ≠ 0 ∧ y ≠ 0 ∧ SameRay ℝ x (-y) := by rw [← o.oangle_eq_zero_iff_sameRay] constructor · intro h by_cases hx : x = 0; · simp [hx, Real.Angle.pi_ne_zero.symm] at h by_cases hy : y = 0; · simp [hy, Real.Angle.pi_ne_zero.symm] at h refine ⟨hx, hy, ?_⟩ rw [o.oangle_neg_right hx hy, h, Real.Angle.coe_pi_add_coe_pi] · rintro ⟨hx, hy, h⟩ rwa [o.oangle_neg_right hx hy, ← Real.Angle.sub_coe_pi_eq_add_coe_pi, sub_eq_zero] at h #align orientation.oangle_eq_pi_iff_same_ray_neg Orientation.oangle_eq_pi_iff_sameRay_neg theorem oangle_eq_zero_or_eq_pi_iff_not_linearIndependent {x y : V} : o.oangle x y = 0 ∨ o.oangle x y = π ↔ ¬LinearIndependent ℝ ![x, y] := by rw [oangle_eq_zero_iff_sameRay, oangle_eq_pi_iff_sameRay_neg, sameRay_or_ne_zero_and_sameRay_neg_iff_not_linearIndependent] #align orientation.oangle_eq_zero_or_eq_pi_iff_not_linear_independent Orientation.oangle_eq_zero_or_eq_pi_iff_not_linearIndependent theorem oangle_eq_zero_or_eq_pi_iff_right_eq_smul {x y : V} : o.oangle x y = 0 ∨ o.oangle x y = π ↔ x = 0 ∨ ∃ r : ℝ, y = r • x := by rw [oangle_eq_zero_iff_sameRay, oangle_eq_pi_iff_sameRay_neg] refine ⟨fun h => ?_, fun h => ?_⟩ · rcases h with (h \| ⟨-, -, h⟩) · by_cases hx : x = 0; · simp [hx] obtain ⟨r, -, rfl⟩ := h.exists_nonneg_left hx exact Or.inr ⟨r, rfl⟩ · by_cases hx : x = 0; · simp [hx] obtain ⟨r, -, hy⟩ := h.exists_nonneg_left hx refine Or.inr ⟨-r, ?_⟩ simp [hy] · rcases h with (rfl \| ⟨r, rfl⟩); · simp by_cases hx : x = 0; · simp [hx] rcases lt_trichotomy r 0 with (hr \| hr \| hr) · rw [← neg_smul] exact Or.inr ⟨hx, smul_ne_zero hr.ne hx, SameRay.sameRay_pos_smul_right x (Left.neg_pos_iff.2 hr)⟩ · simp [hr] · exact Or.inl (SameRay.sameRay_pos_smul_right x hr) #align orientation.oangle_eq_zero_or_eq_pi_iff_right_eq_smul Orientation.oangle_eq_zero_or_eq_pi_iff_right_eq_smul theorem oangle_ne_zero_and_ne_pi_iff_linearIndependent {x y : V} : o.oangle x y ≠ 0 ∧ o.oangle x y ≠ π ↔ LinearIndependent ℝ ![x, y] := by rw [← not_or, ← not_iff_not, Classical.not_not, oangle_eq_zero_or_eq_pi_iff_not_linearIndependent] #align orientation.oangle_ne_zero_and_ne_pi_iff_linear_independent Orientation.oangle_ne_zero_and_ne_pi_iff_linearIndependent theorem eq_iff_norm_eq_and_oangle_eq_zero (x y : V) : x = y ↔ ‖x‖ = ‖y‖ ∧ o.oangle x y = 0 := by rw [oangle_eq_zero_iff_sameRay] constructor · rintro rfl simp; rfl · rcases eq_or_ne y 0 with (rfl \| hy) · simp rintro ⟨h₁, h₂⟩ obtain ⟨r, hr, rfl⟩ := h₂.exists_nonneg_right hy have : ‖y‖ ≠ 0 := by simpa using hy obtain rfl : r = 1 := by apply mul_right_cancel₀ this simpa [norm_smul, _root_.abs_of_nonneg hr] using h₁ simp #align orientation.eq_iff_norm_eq_and_oangle_eq_zero Orientation.eq_iff_norm_eq_and_oangle_eq_zero theorem eq_iff_oangle_eq_zero_of_norm_eq {x y : V} (h : ‖x‖ = ‖y‖) : x = y ↔ o.oangle x y = 0 := ⟨fun he => ((o.eq_iff_norm_eq_and_oangle_eq_zero x y).1 he).2, fun ha => (o.eq_iff_norm_eq_and_oangle_eq_zero x y).2 ⟨h, ha⟩⟩ #align orientation.eq_iff_oangle_eq_zero_of_norm_eq Orientation.eq_iff_oangle_eq_zero_of_norm_eq theorem eq_iff_norm_eq_of_oangle_eq_zero {x y : V} (h : o.oangle x y = 0) : x = y ↔ ‖x‖ = ‖y‖ := ⟨fun he => ((o.eq_iff_norm_eq_and_oangle_eq_zero x y).1 he).1, fun hn => (o.eq_iff_norm_eq_and_oangle_eq_zero x y).2 ⟨hn, h⟩⟩ #align orientation.eq_iff_norm_eq_of_oangle_eq_zero Orientation.eq_iff_norm_eq_of_oangle_eq_zero @[simp] theorem oangle_add {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) : o.oangle x y + o.oangle y z = o.oangle x z := by simp_rw [oangle] rw [← Complex.arg_mul_coe_angle, o.kahler_mul y x z] · congr 1 convert Complex.arg_real_mul _ (_ : 0 < ‖y‖ ^ 2) using 2 · norm_cast · have : 0 < ‖y‖ := by simpa using hy positivity · exact o.kahler_ne_zero hx hy · exact o.kahler_ne_zero hy hz #align orientation.oangle_add Orientation.oangle_add @[simp] theorem oangle_add_swap {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) : o.oangle y z + o.oangle x y = o.oangle x z := by rw [add_comm, o.oangle_add hx hy hz] #align orientation.oangle_add_swap Orientation.oangle_add_swap @[simp] theorem oangle_sub_left {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) : o.oangle x z - o.oangle x y = o.oangle y z := by rw [sub_eq_iff_eq_add, o.oangle_add_swap hx hy hz] #align orientation.oangle_sub_left Orientation.oangle_sub_left @[simp]	Mathlib/Geometry/Euclidean/Angle/Oriented/Basic.lean	540	541	theorem oangle_sub_right {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) : o.oangle x z - o.oangle y z = o.oangle x y := by	rw [sub_eq_iff_eq_add, o.oangle_add hx hy hz]
import Mathlib.Algebra.Group.Pi.Basic import Mathlib.Order.Interval.Set.Basic import Mathlib.Order.Interval.Set.UnorderedInterval import Mathlib.Data.Set.Lattice #align_import data.set.intervals.pi from "leanprover-community/mathlib"@"e4bc74cbaf429d706cb9140902f7ca6c431e75a4" -- Porting note: Added, since dot notation no longer works on `Function.update` open Function variable {ι : Type} {α : ι → Type} namespace Set section PiPreorder variable [∀ i, Preorder (α i)] (x y : ∀ i, α i) @[simp] theorem pi_univ_Ici : (pi univ fun i ↦ Ici (x i)) = Ici x := ext fun y ↦ by simp [Pi.le_def] #align set.pi_univ_Ici Set.pi_univ_Ici @[simp] theorem pi_univ_Iic : (pi univ fun i ↦ Iic (x i)) = Iic x := ext fun y ↦ by simp [Pi.le_def] #align set.pi_univ_Iic Set.pi_univ_Iic @[simp] theorem pi_univ_Icc : (pi univ fun i ↦ Icc (x i) (y i)) = Icc x y := ext fun y ↦ by simp [Pi.le_def, forall_and] #align set.pi_univ_Icc Set.pi_univ_Icc theorem piecewise_mem_Icc {s : Set ι} [∀ j, Decidable (j ∈ s)] {f₁ f₂ g₁ g₂ : ∀ i, α i} (h₁ : ∀ i ∈ s, f₁ i ∈ Icc (g₁ i) (g₂ i)) (h₂ : ∀ i ∉ s, f₂ i ∈ Icc (g₁ i) (g₂ i)) : s.piecewise f₁ f₂ ∈ Icc g₁ g₂ := ⟨le_piecewise (fun i hi ↦ (h₁ i hi).1) fun i hi ↦ (h₂ i hi).1, piecewise_le (fun i hi ↦ (h₁ i hi).2) fun i hi ↦ (h₂ i hi).2⟩ #align set.piecewise_mem_Icc Set.piecewise_mem_Icc theorem piecewise_mem_Icc' {s : Set ι} [∀ j, Decidable (j ∈ s)] {f₁ f₂ g₁ g₂ : ∀ i, α i} (h₁ : f₁ ∈ Icc g₁ g₂) (h₂ : f₂ ∈ Icc g₁ g₂) : s.piecewise f₁ f₂ ∈ Icc g₁ g₂ := piecewise_mem_Icc (fun _ _ ↦ ⟨h₁.1 _, h₁.2 _⟩) fun _ _ ↦ ⟨h₂.1 _, h₂.2 _⟩ #align set.piecewise_mem_Icc' Set.piecewise_mem_Icc' variable [DecidableEq ι] open Function (update) theorem pi_univ_Ioc_update_left {x y : ∀ i, α i} {i₀ : ι} {m : α i₀} (hm : x i₀ ≤ m) : (pi univ fun i ↦ Ioc (update x i₀ m i) (y i)) = { z \| m < z i₀ } ∩ pi univ fun i ↦ Ioc (x i) (y i) := by have : Ioc m (y i₀) = Ioi m ∩ Ioc (x i₀) (y i₀) := by rw [← Ioi_inter_Iic, ← Ioi_inter_Iic, ← inter_assoc, inter_eq_self_of_subset_left (Ioi_subset_Ioi hm)] simp_rw [univ_pi_update i₀ _ _ fun i z ↦ Ioc z (y i), ← pi_inter_compl ({i₀} : Set ι), singleton_pi', ← inter_assoc, this] rfl #align set.pi_univ_Ioc_update_left Set.pi_univ_Ioc_update_left theorem pi_univ_Ioc_update_right {x y : ∀ i, α i} {i₀ : ι} {m : α i₀} (hm : m ≤ y i₀) : (pi univ fun i ↦ Ioc (x i) (update y i₀ m i)) = { z \| z i₀ ≤ m } ∩ pi univ fun i ↦ Ioc (x i) (y i) := by have : Ioc (x i₀) m = Iic m ∩ Ioc (x i₀) (y i₀) := by rw [← Ioi_inter_Iic, ← Ioi_inter_Iic, inter_left_comm, inter_eq_self_of_subset_left (Iic_subset_Iic.2 hm)] simp_rw [univ_pi_update i₀ y m fun i z ↦ Ioc (x i) z, ← pi_inter_compl ({i₀} : Set ι), singleton_pi', ← inter_assoc, this] rfl #align set.pi_univ_Ioc_update_right Set.pi_univ_Ioc_update_right	Mathlib/Order/Interval/Set/Pi.lean	112	118	theorem disjoint_pi_univ_Ioc_update_left_right {x y : ∀ i, α i} {i₀ : ι} {m : α i₀} : Disjoint (pi univ fun i ↦ Ioc (x i) (update y i₀ m i)) (pi univ fun i ↦ Ioc (update x i₀ m i) (y i)) := by	rw [disjoint_left] rintro z h₁ h₂ refine (h₁ i₀ (mem_univ _)).2.not_lt ?_ simpa only [Function.update_same] using (h₂ i₀ (mem_univ _)).1
import Mathlib.Algebra.Module.Card import Mathlib.SetTheory.Cardinal.CountableCover import Mathlib.SetTheory.Cardinal.Continuum import Mathlib.Analysis.SpecificLimits.Normed import Mathlib.Topology.MetricSpace.Perfect universe u v open Filter Pointwise Set Function Cardinal open scoped Cardinal Topology theorem continuum_le_cardinal_of_nontriviallyNormedField (𝕜 : Type) [NontriviallyNormedField 𝕜] [CompleteSpace 𝕜] : 𝔠 ≤ #𝕜 := by suffices ∃ f : (ℕ → Bool) → 𝕜, range f ⊆ univ ∧ Continuous f ∧ Injective f by rcases this with ⟨f, -, -, f_inj⟩ simpa using lift_mk_le_lift_mk_of_injective f_inj apply Perfect.exists_nat_bool_injection _ univ_nonempty refine ⟨isClosed_univ, preperfect_iff_nhds.2 (fun x _ U hU ↦ ?_)⟩ rcases NormedField.exists_norm_lt_one 𝕜 with ⟨c, c_pos, hc⟩ have A : Tendsto (fun n ↦ x + c^n) atTop (𝓝 (x + 0)) := tendsto_const_nhds.add (tendsto_pow_atTop_nhds_zero_of_norm_lt_one hc) rw [add_zero] at A have B : ∀ᶠ n in atTop, x + c^n ∈ U := tendsto_def.1 A U hU rcases B.exists with ⟨n, hn⟩ refine ⟨x + c^n, by simpa using hn, ?_⟩ simp only [ne_eq, add_right_eq_self] apply pow_ne_zero simpa using c_pos theorem continuum_le_cardinal_of_module (𝕜 : Type u) (E : Type v) [NontriviallyNormedField 𝕜] [CompleteSpace 𝕜] [AddCommGroup E] [Module 𝕜 E] [Nontrivial E] : 𝔠 ≤ #E := by have A : lift.{v} (𝔠 : Cardinal.{u}) ≤ lift.{v} (#𝕜) := by simpa using continuum_le_cardinal_of_nontriviallyNormedField 𝕜 simpa using A.trans (Cardinal.mk_le_of_module 𝕜 E) lemma cardinal_eq_of_mem_nhds_zero {E : Type} (𝕜 : Type) [NontriviallyNormedField 𝕜] [AddCommGroup E] [Module 𝕜 E] [TopologicalSpace E] [ContinuousSMul 𝕜 E] {s : Set E} (hs : s ∈ 𝓝 (0 : E)) : #s = #E := by obtain ⟨c, hc⟩ : ∃ x : 𝕜 , 1 < ‖x‖ := NormedField.exists_lt_norm 𝕜 1 have cn_ne : ∀ n, c^n ≠ 0 := by intro n apply pow_ne_zero rintro rfl simp only [norm_zero] at hc exact lt_irrefl _ (hc.trans zero_lt_one) have A : ∀ (x : E), ∀ᶠ n in (atTop : Filter ℕ), x ∈ c^n • s := by intro x have : Tendsto (fun n ↦ (c^n) ⁻¹ • x) atTop (𝓝 ((0 : 𝕜) • x)) := by have : Tendsto (fun n ↦ (c^n)⁻¹) atTop (𝓝 0) := by simp_rw [← inv_pow] apply tendsto_pow_atTop_nhds_zero_of_norm_lt_one rw [norm_inv] exact inv_lt_one hc exact Tendsto.smul_const this x rw [zero_smul] at this filter_upwards [this hs] with n (hn : (c ^ n)⁻¹ • x ∈ s) exact (mem_smul_set_iff_inv_smul_mem₀ (cn_ne n) _ _).2 hn have B : ∀ n, #(c^n • s :) = #s := by intro n have : (c^n • s :) ≃ s := { toFun := fun x ↦ ⟨(c^n)⁻¹ • x.1, (mem_smul_set_iff_inv_smul_mem₀ (cn_ne n) _ _).1 x.2⟩ invFun := fun x ↦ ⟨(c^n) • x.1, smul_mem_smul_set x.2⟩ left_inv := fun x ↦ by simp [smul_smul, mul_inv_cancel (cn_ne n)] right_inv := fun x ↦ by simp [smul_smul, inv_mul_cancel (cn_ne n)] } exact Cardinal.mk_congr this apply (Cardinal.mk_of_countable_eventually_mem A B).symm theorem cardinal_eq_of_mem_nhds {E : Type} (𝕜 : Type) [NontriviallyNormedField 𝕜] [AddCommGroup E] [Module 𝕜 E] [TopologicalSpace E] [ContinuousAdd E] [ContinuousSMul 𝕜 E] {s : Set E} {x : E} (hs : s ∈ 𝓝 x) : #s = #E := by let g := Homeomorph.addLeft x let t := g ⁻¹' s have : t ∈ 𝓝 0 := g.continuous.continuousAt.preimage_mem_nhds (by simpa [g] using hs) have A : #t = #E := cardinal_eq_of_mem_nhds_zero 𝕜 this have B : #t = #s := Cardinal.mk_subtype_of_equiv s g.toEquiv rwa [B] at A theorem cardinal_eq_of_isOpen {E : Type} (𝕜 : Type*) [NontriviallyNormedField 𝕜] [AddCommGroup E] [Module 𝕜 E] [TopologicalSpace E] [ContinuousAdd E] [ContinuousSMul 𝕜 E] {s : Set E} (hs : IsOpen s) (h's : s.Nonempty) : #s = #E := by rcases h's with ⟨x, hx⟩ exact cardinal_eq_of_mem_nhds 𝕜 (hs.mem_nhds hx)	Mathlib/Topology/Algebra/Module/Cardinality.lean	119	123	theorem continuum_le_cardinal_of_isOpen {E : Type} (𝕜 : Type) [NontriviallyNormedField 𝕜] [CompleteSpace 𝕜] [AddCommGroup E] [Module 𝕜 E] [Nontrivial E] [TopologicalSpace E] [ContinuousAdd E] [ContinuousSMul 𝕜 E] {s : Set E} (hs : IsOpen s) (h's : s.Nonempty) : 𝔠 ≤ #s := by	simpa [cardinal_eq_of_isOpen 𝕜 hs h's] using continuum_le_cardinal_of_module 𝕜 E
import Mathlib.LinearAlgebra.AffineSpace.AffineEquiv #align_import linear_algebra.affine_space.midpoint from "leanprover-community/mathlib"@"2196ab363eb097c008d4497125e0dde23fb36db2" open AffineMap AffineEquiv section variable (R : Type) {V V' P P' : Type} [Ring R] [Invertible (2 : R)] [AddCommGroup V] [Module R V] [AddTorsor V P] [AddCommGroup V'] [Module R V'] [AddTorsor V' P'] def midpoint (x y : P) : P := lineMap x y (⅟ 2 : R) #align midpoint midpoint variable {R} {x y z : P} @[simp] theorem AffineMap.map_midpoint (f : P →ᵃ[R] P') (a b : P) : f (midpoint R a b) = midpoint R (f a) (f b) := f.apply_lineMap a b _ #align affine_map.map_midpoint AffineMap.map_midpoint @[simp] theorem AffineEquiv.map_midpoint (f : P ≃ᵃ[R] P') (a b : P) : f (midpoint R a b) = midpoint R (f a) (f b) := f.apply_lineMap a b _ #align affine_equiv.map_midpoint AffineEquiv.map_midpoint theorem AffineEquiv.pointReflection_midpoint_left (x y : P) : pointReflection R (midpoint R x y) x = y := by rw [midpoint, pointReflection_apply, lineMap_apply, vadd_vsub, vadd_vadd, ← add_smul, ← two_mul, mul_invOf_self, one_smul, vsub_vadd] #align affine_equiv.point_reflection_midpoint_left AffineEquiv.pointReflection_midpoint_left @[simp] -- Porting note: added variant with `Equiv.pointReflection` for `simp`	Mathlib/LinearAlgebra/AffineSpace/Midpoint.lean	68	71	theorem Equiv.pointReflection_midpoint_left (x y : P) : (Equiv.pointReflection (midpoint R x y)) x = y := by	rw [midpoint, pointReflection_apply, lineMap_apply, vadd_vsub, vadd_vadd, ← add_smul, ← two_mul, mul_invOf_self, one_smul, vsub_vadd]
import Mathlib.Analysis.Fourier.AddCircle import Mathlib.Analysis.Fourier.FourierTransform import Mathlib.Analysis.PSeries import Mathlib.Analysis.Distribution.SchwartzSpace import Mathlib.MeasureTheory.Measure.Lebesgue.Integral #align_import analysis.fourier.poisson_summation from "leanprover-community/mathlib"@"fd5edc43dc4f10b85abfe544b88f82cf13c5f844" noncomputable section open Function hiding comp_apply open Set hiding restrict_apply open Complex hiding abs_of_nonneg open Real open TopologicalSpace Filter MeasureTheory Asymptotics open scoped Real Filter FourierTransform open ContinuousMap theorem Real.fourierCoeff_tsum_comp_add {f : C(ℝ, ℂ)} (hf : ∀ K : Compacts ℝ, Summable fun n : ℤ => ‖(f.comp (ContinuousMap.addRight n)).restrict K‖) (m : ℤ) : fourierCoeff (Periodic.lift <\| f.periodic_tsum_comp_add_zsmul 1) m = 𝓕 f m := by -- NB: This proof can be shortened somewhat by telescoping together some of the steps in the calc -- block, but I think it's more legible this way. We start with preliminaries about the integrand. let e : C(ℝ, ℂ) := (fourier (-m)).comp ⟨((↑) : ℝ → UnitAddCircle), continuous_quotient_mk'⟩ have neK : ∀ (K : Compacts ℝ) (g : C(ℝ, ℂ)), ‖(e * g).restrict K‖ = ‖g.restrict K‖ := by have (x : ℝ) : ‖e x‖ = 1 := abs_coe_circle (AddCircle.toCircle (-m • x)) intro K g simp_rw [norm_eq_iSup_norm, restrict_apply, mul_apply, norm_mul, this, one_mul] have eadd : ∀ (n : ℤ), e.comp (ContinuousMap.addRight n) = e := by intro n; ext1 x have : Periodic e 1 := Periodic.comp (fun x => AddCircle.coe_add_period 1 x) (fourier (-m)) simpa only [mul_one] using this.int_mul n x -- Now the main argument. First unwind some definitions. calc fourierCoeff (Periodic.lift <\| f.periodic_tsum_comp_add_zsmul 1) m = ∫ x in (0 : ℝ)..1, e x * (∑' n : ℤ, f.comp (ContinuousMap.addRight n)) x := by simp_rw [fourierCoeff_eq_intervalIntegral _ m 0, div_one, one_smul, zero_add, e, comp_apply, coe_mk, Periodic.lift_coe, zsmul_one, smul_eq_mul] -- Transform sum in C(ℝ, ℂ) evaluated at x into pointwise sum of values. _ = ∫ x in (0:ℝ)..1, ∑' n : ℤ, (e * f.comp (ContinuousMap.addRight n)) x := by simp_rw [coe_mul, Pi.mul_apply, ← ContinuousMap.tsum_apply (summable_of_locally_summable_norm hf), tsum_mul_left] -- Swap sum and integral. _ = ∑' n : ℤ, ∫ x in (0:ℝ)..1, (e * f.comp (ContinuousMap.addRight n)) x := by refine (intervalIntegral.tsum_intervalIntegral_eq_of_summable_norm ?_).symm convert hf ⟨uIcc 0 1, isCompact_uIcc⟩ using 1 exact funext fun n => neK _ _ _ = ∑' n : ℤ, ∫ x in (0:ℝ)..1, (e * f).comp (ContinuousMap.addRight n) x := by simp only [ContinuousMap.comp_apply, mul_comp] at eadd ⊢ simp_rw [eadd] -- Rearrange sum of interval integrals into an integral over `ℝ`. _ = ∫ x, e x * f x := by suffices Integrable (e * f) from this.hasSum_intervalIntegral_comp_add_int.tsum_eq apply integrable_of_summable_norm_Icc convert hf ⟨Icc 0 1, isCompact_Icc⟩ using 1 simp_rw [mul_comp] at eadd ⊢ simp_rw [eadd] exact funext fun n => neK ⟨Icc 0 1, isCompact_Icc⟩ _ -- Minor tidying to finish _ = 𝓕 f m := by rw [fourierIntegral_real_eq_integral_exp_smul] congr 1 with x : 1 rw [smul_eq_mul, comp_apply, coe_mk, coe_mk, ContinuousMap.toFun_eq_coe, fourier_coe_apply] congr 2 push_cast ring #align real.fourier_coeff_tsum_comp_add Real.fourierCoeff_tsum_comp_add theorem Real.tsum_eq_tsum_fourierIntegral {f : C(ℝ, ℂ)} (h_norm : ∀ K : Compacts ℝ, Summable fun n : ℤ => ‖(f.comp <\| ContinuousMap.addRight n).restrict K‖) (h_sum : Summable fun n : ℤ => 𝓕 f n) (x : ℝ) : ∑' n : ℤ, f (x + n) = ∑' n : ℤ, 𝓕 f n * fourier n (x : UnitAddCircle) := by let F : C(UnitAddCircle, ℂ) := ⟨(f.periodic_tsum_comp_add_zsmul 1).lift, continuous_coinduced_dom.mpr (map_continuous _)⟩ have : Summable (fourierCoeff F) := by convert h_sum exact Real.fourierCoeff_tsum_comp_add h_norm _ convert (has_pointwise_sum_fourier_series_of_summable this x).tsum_eq.symm using 1 · simpa only [F, coe_mk, ← QuotientAddGroup.mk_zero, Periodic.lift_coe, zsmul_one, comp_apply, coe_addRight, zero_add] using (hasSum_apply (summable_of_locally_summable_norm h_norm).hasSum x).tsum_eq · simp_rw [← Real.fourierCoeff_tsum_comp_add h_norm, smul_eq_mul, F, coe_mk] #align real.tsum_eq_tsum_fourier_integral Real.tsum_eq_tsum_fourierIntegral section RpowDecay variable {E : Type} [NormedAddCommGroup E] theorem isBigO_norm_Icc_restrict_atTop {f : C(ℝ, E)} {b : ℝ} (hb : 0 < b) (hf : f =O[atTop] fun x : ℝ => \|x\| ^ (-b)) (R S : ℝ) : (fun x : ℝ => ‖f.restrict (Icc (x + R) (x + S))‖) =O[atTop] fun x : ℝ => \|x\| ^ (-b) := by -- First establish an explicit estimate on decay of inverse powers. -- This is logically independent of the rest of the proof, but of no mathematical interest in -- itself, so it is proved in-line rather than being formulated as a separate lemma. have claim : ∀ x : ℝ, max 0 (-2 R) < x → ∀ y : ℝ, x + R ≤ y → y ^ (-b) ≤ (1 / 2) ^ (-b) * x ^ (-b) := fun x hx y hy ↦ by rw [max_lt_iff] at hx obtain ⟨hx1, hx2⟩ := hx rw [← mul_rpow] <;> try positivity apply rpow_le_rpow_of_nonpos <;> linarith -- Now the main proof. obtain ⟨c, hc, hc'⟩ := hf.exists_pos simp only [IsBigO, IsBigOWith, eventually_atTop] at hc' ⊢ obtain ⟨d, hd⟩ := hc' refine ⟨c * (1 / 2) ^ (-b), ⟨max (1 + max 0 (-2 * R)) (d - R), fun x hx => ?_⟩⟩ rw [ge_iff_le, max_le_iff] at hx have hx' : max 0 (-2 * R) < x := by linarith rw [max_lt_iff] at hx' rw [norm_norm, ContinuousMap.norm_le _ (by positivity)] refine fun y => (hd y.1 (by linarith [hx.1, y.2.1])).trans ?_ have A : ∀ x : ℝ, 0 ≤ \|x\| ^ (-b) := fun x => by positivity rw [mul_assoc, mul_le_mul_left hc, norm_of_nonneg (A _), norm_of_nonneg (A _)] convert claim x (by linarith only [hx.1]) y.1 y.2.1 · apply abs_of_nonneg; linarith [y.2.1] · exact abs_of_pos hx'.1 set_option linter.uppercaseLean3 false in #align is_O_norm_Icc_restrict_at_top isBigO_norm_Icc_restrict_atTop theorem isBigO_norm_Icc_restrict_atBot {f : C(ℝ, E)} {b : ℝ} (hb : 0 < b) (hf : f =O[atBot] fun x : ℝ => \|x\| ^ (-b)) (R S : ℝ) : (fun x : ℝ => ‖f.restrict (Icc (x + R) (x + S))‖) =O[atBot] fun x : ℝ => \|x\| ^ (-b) := by have h1 : (f.comp (ContinuousMap.mk _ continuous_neg)) =O[atTop] fun x : ℝ => \|x\| ^ (-b) := by convert hf.comp_tendsto tendsto_neg_atTop_atBot using 1 ext1 x; simp only [Function.comp_apply, abs_neg] have h2 := (isBigO_norm_Icc_restrict_atTop hb h1 (-S) (-R)).comp_tendsto tendsto_neg_atBot_atTop have : (fun x : ℝ => \|x\| ^ (-b)) ∘ Neg.neg = fun x : ℝ => \|x\| ^ (-b) := by ext1 x; simp only [Function.comp_apply, abs_neg] rw [this] at h2 refine (isBigO_of_le _ fun x => ?_).trans h2 -- equality holds, but less work to prove `≤` alone rw [norm_norm, Function.comp_apply, norm_norm, ContinuousMap.norm_le _ (norm_nonneg _)] rintro ⟨x, hx⟩ rw [ContinuousMap.restrict_apply_mk] refine (le_of_eq ?_).trans (ContinuousMap.norm_coe_le_norm _ ⟨-x, ?_⟩) · rw [ContinuousMap.restrict_apply_mk, ContinuousMap.comp_apply, ContinuousMap.coe_mk, ContinuousMap.coe_mk, neg_neg] exact ⟨by linarith [hx.2], by linarith [hx.1]⟩ set_option linter.uppercaseLean3 false in #align is_O_norm_Icc_restrict_at_bot isBigO_norm_Icc_restrict_atBot	Mathlib/Analysis/Fourier/PoissonSummation.lean	183	201	theorem isBigO_norm_restrict_cocompact (f : C(ℝ, E)) {b : ℝ} (hb : 0 < b) (hf : f =O[cocompact ℝ] fun x : ℝ => \|x\| ^ (-b)) (K : Compacts ℝ) : (fun x => ‖(f.comp (ContinuousMap.addRight x)).restrict K‖) =O[cocompact ℝ] (\|·\| ^ (-b)) := by	obtain ⟨r, hr⟩ := K.isCompact.isBounded.subset_closedBall 0 rw [closedBall_eq_Icc, zero_add, zero_sub] at hr have : ∀ x : ℝ, ‖(f.comp (ContinuousMap.addRight x)).restrict K‖ ≤ ‖f.restrict (Icc (x - r) (x + r))‖ := by intro x rw [ContinuousMap.norm_le _ (norm_nonneg _)] rintro ⟨y, hy⟩ refine (le_of_eq ?_).trans (ContinuousMap.norm_coe_le_norm _ ⟨y + x, ?_⟩) · simp_rw [ContinuousMap.restrict_apply, ContinuousMap.comp_apply, ContinuousMap.coe_addRight] · exact ⟨by linarith [(hr hy).1], by linarith [(hr hy).2]⟩ simp_rw [cocompact_eq_atBot_atTop, isBigO_sup] at hf ⊢ constructor · refine (isBigO_of_le atBot ?_).trans (isBigO_norm_Icc_restrict_atBot hb hf.1 (-r) r) simp_rw [norm_norm]; exact this · refine (isBigO_of_le atTop ?_).trans (isBigO_norm_Icc_restrict_atTop hb hf.2 (-r) r) simp_rw [norm_norm]; exact this
import Mathlib.Analysis.NormedSpace.Multilinear.Basic import Mathlib.LinearAlgebra.PiTensorProduct universe uι u𝕜 uE uF variable {ι : Type uι} [Fintype ι] variable {𝕜 : Type u𝕜} [NontriviallyNormedField 𝕜] variable {E : ι → Type uE} [∀ i, SeminormedAddCommGroup (E i)] [∀ i, NormedSpace 𝕜 (E i)] variable {F : Type uF} [SeminormedAddCommGroup F] [NormedSpace 𝕜 F] open scoped TensorProduct namespace PiTensorProduct def projectiveSeminormAux : FreeAddMonoid (𝕜 × Π i, E i) → ℝ := List.sum ∘ (List.map (fun p ↦ ‖p.1‖ * ∏ i, ‖p.2 i‖)) theorem projectiveSeminormAux_nonneg (p : FreeAddMonoid (𝕜 × Π i, E i)) : 0 ≤ projectiveSeminormAux p := by simp only [projectiveSeminormAux, Function.comp_apply] refine List.sum_nonneg ?_ intro a simp only [Multiset.map_coe, Multiset.mem_coe, List.mem_map, Prod.exists, forall_exists_index, and_imp] intro x m _ h rw [← h] exact mul_nonneg (norm_nonneg _) (Finset.prod_nonneg (fun _ _ ↦ norm_nonneg _)) theorem projectiveSeminormAux_add_le (p q : FreeAddMonoid (𝕜 × Π i, E i)) : projectiveSeminormAux (p + q) ≤ projectiveSeminormAux p + projectiveSeminormAux q := by simp only [projectiveSeminormAux, Function.comp_apply, Multiset.map_coe, Multiset.sum_coe] erw [List.map_append] rw [List.sum_append] rfl theorem projectiveSeminormAux_smul (p : FreeAddMonoid (𝕜 × Π i, E i)) (a : 𝕜) : projectiveSeminormAux (List.map (fun (y : 𝕜 × Π i, E i) ↦ (a * y.1, y.2)) p) = ‖a‖ * projectiveSeminormAux p := by simp only [projectiveSeminormAux, Function.comp_apply, Multiset.map_coe, List.map_map, Multiset.sum_coe] rw [← smul_eq_mul, List.smul_sum, ← List.comp_map] congr 2 ext x simp only [Function.comp_apply, norm_mul, smul_eq_mul] rw [mul_assoc] theorem bddBelow_projectiveSemiNormAux (x : ⨂[𝕜] i, E i) : BddBelow (Set.range (fun (p : lifts x) ↦ projectiveSeminormAux p.1)) := by existsi 0 rw [mem_lowerBounds] simp only [Set.mem_range, Subtype.exists, exists_prop, forall_exists_index, and_imp, forall_apply_eq_imp_iff₂] exact fun p _ ↦ projectiveSeminormAux_nonneg p noncomputable def projectiveSeminorm : Seminorm 𝕜 (⨂[𝕜] i, E i) := by refine Seminorm.ofSMulLE (fun x ↦ iInf (fun (p : lifts x) ↦ projectiveSeminormAux p.1)) ?_ ?_ ?_ · refine le_antisymm ?_ ?_ · refine ciInf_le_of_le (bddBelow_projectiveSemiNormAux (0 : ⨂[𝕜] i, E i)) ⟨0, lifts_zero⟩ ?_ simp only [projectiveSeminormAux, Function.comp_apply] rw [List.sum_eq_zero] intro _ simp only [List.mem_map, Prod.exists, forall_exists_index, and_imp] intro _ _ hxm rw [← FreeAddMonoid.ofList_nil] at hxm exfalso exact List.not_mem_nil _ hxm · letI : Nonempty (lifts 0) := ⟨0, lifts_zero (R := 𝕜) (s := E)⟩ exact le_ciInf (fun p ↦ projectiveSeminormAux_nonneg p.1) · intro x y letI := nonempty_subtype.mpr (nonempty_lifts x); letI := nonempty_subtype.mpr (nonempty_lifts y) exact le_ciInf_add_ciInf (fun p q ↦ ciInf_le_of_le (bddBelow_projectiveSemiNormAux _) ⟨p.1 + q.1, lifts_add p.2 q.2⟩ (projectiveSeminormAux_add_le p.1 q.1)) · intro a x letI := nonempty_subtype.mpr (nonempty_lifts x) rw [Real.mul_iInf_of_nonneg (norm_nonneg _)] refine le_ciInf ?_ intro p rw [← projectiveSeminormAux_smul] exact ciInf_le_of_le (bddBelow_projectiveSemiNormAux _) ⟨(List.map (fun y ↦ (a * y.1, y.2)) p.1), lifts_smul p.2 a⟩ (le_refl _) theorem projectiveSeminorm_apply (x : ⨂[𝕜] i, E i) : projectiveSeminorm x = iInf (fun (p : lifts x) ↦ projectiveSeminormAux p.1) := rfl theorem projectiveSeminorm_tprod_le (m : Π i, E i) : projectiveSeminorm (⨂ₜ[𝕜] i, m i) ≤ ∏ i, ‖m i‖ := by rw [projectiveSeminorm_apply] convert ciInf_le (bddBelow_projectiveSemiNormAux _) ⟨[((1 : 𝕜), m)] ,?_⟩ · simp only [projectiveSeminormAux, Function.comp_apply, List.map_cons, norm_one, one_mul, List.map_nil, List.sum_cons, List.sum_nil, add_zero] · rw [mem_lifts_iff, List.map_singleton, List.sum_singleton, one_smul]	Mathlib/Analysis/NormedSpace/PiTensorProduct/ProjectiveSeminorm.lean	134	153	theorem norm_eval_le_projectiveSeminorm (x : ⨂[𝕜] i, E i) (G : Type) [SeminormedAddCommGroup G] [NormedSpace 𝕜 G] (f : ContinuousMultilinearMap 𝕜 E G) : ‖lift f.toMultilinearMap x‖ ≤ projectiveSeminorm x ‖f‖ := by	letI := nonempty_subtype.mpr (nonempty_lifts x) rw [projectiveSeminorm_apply, Real.iInf_mul_of_nonneg (norm_nonneg _), projectiveSeminormAux] refine le_ciInf ?_ intro ⟨p, hp⟩ rw [mem_lifts_iff] at hp conv_lhs => rw [← hp, ← List.sum_map_hom, ← Multiset.sum_coe] refine le_trans (norm_multiset_sum_le _) ?_ simp only [tprodCoeff_eq_smul_tprod, Multiset.map_coe, List.map_map, Multiset.sum_coe, Function.comp_apply] rw [mul_comm, ← smul_eq_mul, List.smul_sum] refine List.Forall₂.sum_le_sum ?_ simp only [smul_eq_mul, List.map_map, List.forall₂_map_right_iff, Function.comp_apply, List.forall₂_map_left_iff, map_smul, lift.tprod, ContinuousMultilinearMap.coe_coe, List.forall₂_same, Prod.forall] intro a m _ rw [norm_smul, ← mul_assoc, mul_comm ‖f‖ _, mul_assoc] exact mul_le_mul_of_nonneg_left (f.le_opNorm _) (norm_nonneg _)
import Mathlib.Algebra.Order.Group.Abs import Mathlib.Algebra.Order.Group.Basic import Mathlib.Algebra.Order.Group.OrderIso import Mathlib.Algebra.Order.Ring.Defs import Mathlib.Data.Int.Cast.Lemmas import Mathlib.Order.Interval.Set.Basic import Mathlib.Logic.Pairwise #align_import data.set.intervals.group from "leanprover-community/mathlib"@"c227d107bbada5d0d9d20287e3282c0a7f1651a0" variable {α : Type*} namespace Set section LinearOrderedAddCommGroup variable [LinearOrderedAddCommGroup α]	Mathlib/Algebra/Order/Interval/Set/Group.lean	151	157	theorem nonempty_Ico_sdiff {x dx y dy : α} (h : dy < dx) (hx : 0 < dx) : Nonempty ↑(Ico x (x + dx) \ Ico y (y + dy)) := by	cases' lt_or_le x y with h' h' · use x simp [, not_le.2 h'] · use max x (x + dy) simp [, le_refl]
import Mathlib.Order.Interval.Set.Image import Mathlib.Order.CompleteLatticeIntervals import Mathlib.Topology.Order.DenselyOrdered import Mathlib.Topology.Order.Monotone #align_import topology.algebra.order.intermediate_value from "leanprover-community/mathlib"@"4c19a16e4b705bf135cf9a80ac18fcc99c438514" open Filter OrderDual TopologicalSpace Function Set open Topology Filter universe u v w section variable {X : Type u} {α : Type v} [TopologicalSpace X] [LinearOrder α] [TopologicalSpace α] [OrderClosedTopology α] theorem intermediate_value_univ₂ [PreconnectedSpace X] {a b : X} {f g : X → α} (hf : Continuous f) (hg : Continuous g) (ha : f a ≤ g a) (hb : g b ≤ f b) : ∃ x, f x = g x := by obtain ⟨x, _, hfg, hgf⟩ : (univ ∩ { x \| f x ≤ g x ∧ g x ≤ f x }).Nonempty := isPreconnected_closed_iff.1 PreconnectedSpace.isPreconnected_univ _ _ (isClosed_le hf hg) (isClosed_le hg hf) (fun _ _ => le_total _ _) ⟨a, trivial, ha⟩ ⟨b, trivial, hb⟩ exact ⟨x, le_antisymm hfg hgf⟩ #align intermediate_value_univ₂ intermediate_value_univ₂ theorem intermediate_value_univ₂_eventually₁ [PreconnectedSpace X] {a : X} {l : Filter X} [NeBot l] {f g : X → α} (hf : Continuous f) (hg : Continuous g) (ha : f a ≤ g a) (he : g ≤ᶠ[l] f) : ∃ x, f x = g x := let ⟨_, h⟩ := he.exists; intermediate_value_univ₂ hf hg ha h #align intermediate_value_univ₂_eventually₁ intermediate_value_univ₂_eventually₁ theorem intermediate_value_univ₂_eventually₂ [PreconnectedSpace X] {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] {f g : X → α} (hf : Continuous f) (hg : Continuous g) (he₁ : f ≤ᶠ[l₁] g) (he₂ : g ≤ᶠ[l₂] f) : ∃ x, f x = g x := let ⟨_, h₁⟩ := he₁.exists let ⟨_, h₂⟩ := he₂.exists intermediate_value_univ₂ hf hg h₁ h₂ #align intermediate_value_univ₂_eventually₂ intermediate_value_univ₂_eventually₂ theorem IsPreconnected.intermediate_value₂ {s : Set X} (hs : IsPreconnected s) {a b : X} (ha : a ∈ s) (hb : b ∈ s) {f g : X → α} (hf : ContinuousOn f s) (hg : ContinuousOn g s) (ha' : f a ≤ g a) (hb' : g b ≤ f b) : ∃ x ∈ s, f x = g x := let ⟨x, hx⟩ := @intermediate_value_univ₂ s α _ _ _ _ (Subtype.preconnectedSpace hs) ⟨a, ha⟩ ⟨b, hb⟩ _ _ (continuousOn_iff_continuous_restrict.1 hf) (continuousOn_iff_continuous_restrict.1 hg) ha' hb' ⟨x, x.2, hx⟩ #align is_preconnected.intermediate_value₂ IsPreconnected.intermediate_value₂ theorem IsPreconnected.intermediate_value₂_eventually₁ {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f g : X → α} (hf : ContinuousOn f s) (hg : ContinuousOn g s) (ha' : f a ≤ g a) (he : g ≤ᶠ[l] f) : ∃ x ∈ s, f x = g x := by rw [continuousOn_iff_continuous_restrict] at hf hg obtain ⟨b, h⟩ := @intermediate_value_univ₂_eventually₁ _ _ _ _ _ _ (Subtype.preconnectedSpace hs) ⟨a, ha⟩ _ (comap_coe_neBot_of_le_principal hl) _ _ hf hg ha' (he.comap _) exact ⟨b, b.prop, h⟩ #align is_preconnected.intermediate_value₂_eventually₁ IsPreconnected.intermediate_value₂_eventually₁ theorem IsPreconnected.intermediate_value₂_eventually₂ {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f g : X → α} (hf : ContinuousOn f s) (hg : ContinuousOn g s) (he₁ : f ≤ᶠ[l₁] g) (he₂ : g ≤ᶠ[l₂] f) : ∃ x ∈ s, f x = g x := by rw [continuousOn_iff_continuous_restrict] at hf hg obtain ⟨b, h⟩ := @intermediate_value_univ₂_eventually₂ _ _ _ _ _ _ (Subtype.preconnectedSpace hs) _ _ (comap_coe_neBot_of_le_principal hl₁) (comap_coe_neBot_of_le_principal hl₂) _ _ hf hg (he₁.comap _) (he₂.comap _) exact ⟨b, b.prop, h⟩ #align is_preconnected.intermediate_value₂_eventually₂ IsPreconnected.intermediate_value₂_eventually₂ theorem IsPreconnected.intermediate_value {s : Set X} (hs : IsPreconnected s) {a b : X} (ha : a ∈ s) (hb : b ∈ s) {f : X → α} (hf : ContinuousOn f s) : Icc (f a) (f b) ⊆ f '' s := fun _x hx => hs.intermediate_value₂ ha hb hf continuousOn_const hx.1 hx.2 #align is_preconnected.intermediate_value IsPreconnected.intermediate_value theorem IsPreconnected.intermediate_value_Ico {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v : α} (ht : Tendsto f l (𝓝 v)) : Ico (f a) v ⊆ f '' s := fun _ h => hs.intermediate_value₂_eventually₁ ha hl hf continuousOn_const h.1 (eventually_ge_of_tendsto_gt h.2 ht) #align is_preconnected.intermediate_value_Ico IsPreconnected.intermediate_value_Ico theorem IsPreconnected.intermediate_value_Ioc {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v : α} (ht : Tendsto f l (𝓝 v)) : Ioc v (f a) ⊆ f '' s := fun _ h => (hs.intermediate_value₂_eventually₁ ha hl continuousOn_const hf h.2 (eventually_le_of_tendsto_lt h.1 ht)).imp fun _ h => h.imp_right Eq.symm #align is_preconnected.intermediate_value_Ioc IsPreconnected.intermediate_value_Ioc theorem IsPreconnected.intermediate_value_Ioo {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v₁ v₂ : α} (ht₁ : Tendsto f l₁ (𝓝 v₁)) (ht₂ : Tendsto f l₂ (𝓝 v₂)) : Ioo v₁ v₂ ⊆ f '' s := fun _ h => hs.intermediate_value₂_eventually₂ hl₁ hl₂ hf continuousOn_const (eventually_le_of_tendsto_lt h.1 ht₁) (eventually_ge_of_tendsto_gt h.2 ht₂) #align is_preconnected.intermediate_value_Ioo IsPreconnected.intermediate_value_Ioo theorem IsPreconnected.intermediate_value_Ici {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) (ht : Tendsto f l atTop) : Ici (f a) ⊆ f '' s := fun y h => hs.intermediate_value₂_eventually₁ ha hl hf continuousOn_const h (tendsto_atTop.1 ht y) #align is_preconnected.intermediate_value_Ici IsPreconnected.intermediate_value_Ici theorem IsPreconnected.intermediate_value_Iic {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) (ht : Tendsto f l atBot) : Iic (f a) ⊆ f '' s := fun y h => (hs.intermediate_value₂_eventually₁ ha hl continuousOn_const hf h (tendsto_atBot.1 ht y)).imp fun _ h => h.imp_right Eq.symm #align is_preconnected.intermediate_value_Iic IsPreconnected.intermediate_value_Iic theorem IsPreconnected.intermediate_value_Ioi {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v : α} (ht₁ : Tendsto f l₁ (𝓝 v)) (ht₂ : Tendsto f l₂ atTop) : Ioi v ⊆ f '' s := fun y h => hs.intermediate_value₂_eventually₂ hl₁ hl₂ hf continuousOn_const (eventually_le_of_tendsto_lt h ht₁) (tendsto_atTop.1 ht₂ y) #align is_preconnected.intermediate_value_Ioi IsPreconnected.intermediate_value_Ioi theorem IsPreconnected.intermediate_value_Iio {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v : α} (ht₁ : Tendsto f l₁ atBot) (ht₂ : Tendsto f l₂ (𝓝 v)) : Iio v ⊆ f '' s := fun y h => hs.intermediate_value₂_eventually₂ hl₁ hl₂ hf continuousOn_const (tendsto_atBot.1 ht₁ y) (eventually_ge_of_tendsto_gt h ht₂) #align is_preconnected.intermediate_value_Iio IsPreconnected.intermediate_value_Iio theorem IsPreconnected.intermediate_value_Iii {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) (ht₁ : Tendsto f l₁ atBot) (ht₂ : Tendsto f l₂ atTop) : univ ⊆ f '' s := fun y _ => hs.intermediate_value₂_eventually₂ hl₁ hl₂ hf continuousOn_const (tendsto_atBot.1 ht₁ y) (tendsto_atTop.1 ht₂ y) set_option linter.uppercaseLean3 false in #align is_preconnected.intermediate_value_Iii IsPreconnected.intermediate_value_Iii theorem intermediate_value_univ [PreconnectedSpace X] (a b : X) {f : X → α} (hf : Continuous f) : Icc (f a) (f b) ⊆ range f := fun _ hx => intermediate_value_univ₂ hf continuous_const hx.1 hx.2 #align intermediate_value_univ intermediate_value_univ theorem mem_range_of_exists_le_of_exists_ge [PreconnectedSpace X] {c : α} {f : X → α} (hf : Continuous f) (h₁ : ∃ a, f a ≤ c) (h₂ : ∃ b, c ≤ f b) : c ∈ range f := let ⟨a, ha⟩ := h₁; let ⟨b, hb⟩ := h₂; intermediate_value_univ a b hf ⟨ha, hb⟩ #align mem_range_of_exists_le_of_exists_ge mem_range_of_exists_le_of_exists_ge theorem IsPreconnected.Icc_subset {s : Set α} (hs : IsPreconnected s) {a b : α} (ha : a ∈ s) (hb : b ∈ s) : Icc a b ⊆ s := by simpa only [image_id] using hs.intermediate_value ha hb continuousOn_id #align is_preconnected.Icc_subset IsPreconnected.Icc_subset theorem IsPreconnected.ordConnected {s : Set α} (h : IsPreconnected s) : OrdConnected s := ⟨fun _ hx _ hy => h.Icc_subset hx hy⟩ #align is_preconnected.ord_connected IsPreconnected.ordConnected theorem IsConnected.Icc_subset {s : Set α} (hs : IsConnected s) {a b : α} (ha : a ∈ s) (hb : b ∈ s) : Icc a b ⊆ s := hs.2.Icc_subset ha hb #align is_connected.Icc_subset IsConnected.Icc_subset theorem IsPreconnected.eq_univ_of_unbounded {s : Set α} (hs : IsPreconnected s) (hb : ¬BddBelow s) (ha : ¬BddAbove s) : s = univ := by refine eq_univ_of_forall fun x => ?_ obtain ⟨y, ys, hy⟩ : ∃ y ∈ s, y < x := not_bddBelow_iff.1 hb x obtain ⟨z, zs, hz⟩ : ∃ z ∈ s, x < z := not_bddAbove_iff.1 ha x exact hs.Icc_subset ys zs ⟨le_of_lt hy, le_of_lt hz⟩ #align is_preconnected.eq_univ_of_unbounded IsPreconnected.eq_univ_of_unbounded end variable {α : Type u} {β : Type v} {γ : Type w} [ConditionallyCompleteLinearOrder α] [TopologicalSpace α] [OrderTopology α] [ConditionallyCompleteLinearOrder β] [TopologicalSpace β] [OrderTopology β] [Nonempty γ] theorem IsConnected.Ioo_csInf_csSup_subset {s : Set α} (hs : IsConnected s) (hb : BddBelow s) (ha : BddAbove s) : Ioo (sInf s) (sSup s) ⊆ s := fun _x hx => let ⟨_y, ys, hy⟩ := (isGLB_lt_iff (isGLB_csInf hs.nonempty hb)).1 hx.1 let ⟨_z, zs, hz⟩ := (lt_isLUB_iff (isLUB_csSup hs.nonempty ha)).1 hx.2 hs.Icc_subset ys zs ⟨hy.le, hz.le⟩ #align is_connected.Ioo_cInf_cSup_subset IsConnected.Ioo_csInf_csSup_subset theorem eq_Icc_csInf_csSup_of_connected_bdd_closed {s : Set α} (hc : IsConnected s) (hb : BddBelow s) (ha : BddAbove s) (hcl : IsClosed s) : s = Icc (sInf s) (sSup s) := (subset_Icc_csInf_csSup hb ha).antisymm <\| hc.Icc_subset (hcl.csInf_mem hc.nonempty hb) (hcl.csSup_mem hc.nonempty ha) #align eq_Icc_cInf_cSup_of_connected_bdd_closed eq_Icc_csInf_csSup_of_connected_bdd_closed theorem IsPreconnected.Ioi_csInf_subset {s : Set α} (hs : IsPreconnected s) (hb : BddBelow s) (ha : ¬BddAbove s) : Ioi (sInf s) ⊆ s := fun x hx => have sne : s.Nonempty := nonempty_of_not_bddAbove ha let ⟨_y, ys, hy⟩ : ∃ y ∈ s, y < x := (isGLB_lt_iff (isGLB_csInf sne hb)).1 hx let ⟨_z, zs, hz⟩ : ∃ z ∈ s, x < z := not_bddAbove_iff.1 ha x hs.Icc_subset ys zs ⟨hy.le, hz.le⟩ #align is_preconnected.Ioi_cInf_subset IsPreconnected.Ioi_csInf_subset theorem IsPreconnected.Iio_csSup_subset {s : Set α} (hs : IsPreconnected s) (hb : ¬BddBelow s) (ha : BddAbove s) : Iio (sSup s) ⊆ s := IsPreconnected.Ioi_csInf_subset (α := αᵒᵈ) hs ha hb #align is_preconnected.Iio_cSup_subset IsPreconnected.Iio_csSup_subset theorem IsPreconnected.mem_intervals {s : Set α} (hs : IsPreconnected s) : s ∈ ({Icc (sInf s) (sSup s), Ico (sInf s) (sSup s), Ioc (sInf s) (sSup s), Ioo (sInf s) (sSup s), Ici (sInf s), Ioi (sInf s), Iic (sSup s), Iio (sSup s), univ, ∅} : Set (Set α)) := by rcases s.eq_empty_or_nonempty with (rfl \| hne) · apply_rules [Or.inr, mem_singleton] have hs' : IsConnected s := ⟨hne, hs⟩ by_cases hb : BddBelow s <;> by_cases ha : BddAbove s · refine mem_of_subset_of_mem ?_ <\| mem_Icc_Ico_Ioc_Ioo_of_subset_of_subset (hs'.Ioo_csInf_csSup_subset hb ha) (subset_Icc_csInf_csSup hb ha) simp only [insert_subset_iff, mem_insert_iff, mem_singleton_iff, true_or, or_true, singleton_subset_iff, and_self] · refine Or.inr <\| Or.inr <\| Or.inr <\| Or.inr ?_ cases' mem_Ici_Ioi_of_subset_of_subset (hs.Ioi_csInf_subset hb ha) fun x hx => csInf_le hb hx with hs hs · exact Or.inl hs · exact Or.inr (Or.inl hs) · iterate 6 apply Or.inr cases' mem_Iic_Iio_of_subset_of_subset (hs.Iio_csSup_subset hb ha) fun x hx => le_csSup ha hx with hs hs · exact Or.inl hs · exact Or.inr (Or.inl hs) · iterate 8 apply Or.inr exact Or.inl (hs.eq_univ_of_unbounded hb ha) #align is_preconnected.mem_intervals IsPreconnected.mem_intervals theorem setOf_isPreconnected_subset_of_ordered : { s : Set α \| IsPreconnected s } ⊆ -- bounded intervals (range (uncurry Icc) ∪ range (uncurry Ico) ∪ range (uncurry Ioc) ∪ range (uncurry Ioo)) ∪ -- unbounded intervals and `univ` (range Ici ∪ range Ioi ∪ range Iic ∪ range Iio ∪ {univ, ∅}) := by intro s hs rcases hs.mem_intervals with (hs \| hs \| hs \| hs \| hs \| hs \| hs \| hs \| hs \| hs) <;> rw [hs] <;> simp only [union_insert, union_singleton, mem_insert_iff, mem_union, mem_range, Prod.exists, uncurry_apply_pair, exists_apply_eq_apply, true_or, or_true, exists_apply_eq_apply2] #align set_of_is_preconnected_subset_of_ordered setOf_isPreconnected_subset_of_ordered theorem IsClosed.mem_of_ge_of_forall_exists_gt {a b : α} {s : Set α} (hs : IsClosed (s ∩ Icc a b)) (ha : a ∈ s) (hab : a ≤ b) (hgt : ∀ x ∈ s ∩ Ico a b, (s ∩ Ioc x b).Nonempty) : b ∈ s := by let S := s ∩ Icc a b replace ha : a ∈ S := ⟨ha, left_mem_Icc.2 hab⟩ have Sbd : BddAbove S := ⟨b, fun z hz => hz.2.2⟩ let c := sSup (s ∩ Icc a b) have c_mem : c ∈ S := hs.csSup_mem ⟨_, ha⟩ Sbd have c_le : c ≤ b := csSup_le ⟨_, ha⟩ fun x hx => hx.2.2 cases' eq_or_lt_of_le c_le with hc hc · exact hc ▸ c_mem.1 exfalso rcases hgt c ⟨c_mem.1, c_mem.2.1, hc⟩ with ⟨x, xs, cx, xb⟩ exact not_lt_of_le (le_csSup Sbd ⟨xs, le_trans (le_csSup Sbd ha) (le_of_lt cx), xb⟩) cx #align is_closed.mem_of_ge_of_forall_exists_gt IsClosed.mem_of_ge_of_forall_exists_gt	Mathlib/Topology/Order/IntermediateValue.lean	352	364	theorem IsClosed.Icc_subset_of_forall_exists_gt {a b : α} {s : Set α} (hs : IsClosed (s ∩ Icc a b)) (ha : a ∈ s) (hgt : ∀ x ∈ s ∩ Ico a b, ∀ y ∈ Ioi x, (s ∩ Ioc x y).Nonempty) : Icc a b ⊆ s := by	intro y hy have : IsClosed (s ∩ Icc a y) := by suffices s ∩ Icc a y = s ∩ Icc a b ∩ Icc a y by rw [this] exact IsClosed.inter hs isClosed_Icc rw [inter_assoc] congr exact (inter_eq_self_of_subset_right <\| Icc_subset_Icc_right hy.2).symm exact IsClosed.mem_of_ge_of_forall_exists_gt this ha hy.1 fun x hx => hgt x ⟨hx.1, Ico_subset_Ico_right hy.2 hx.2⟩ y hx.2.2
import Mathlib.Topology.PartialHomeomorph import Mathlib.Analysis.Normed.Group.AddTorsor import Mathlib.Analysis.NormedSpace.Pointwise import Mathlib.Data.Real.Sqrt #align_import analysis.normed_space.basic from "leanprover-community/mathlib"@"bc91ed7093bf098d253401e69df601fc33dde156" open Set Metric Pointwise variable {E : Type} [SeminormedAddCommGroup E] [NormedSpace ℝ E] noncomputable section @[simps (config := .lemmasOnly)] def PartialHomeomorph.univUnitBall : PartialHomeomorph E E where toFun x := (√(1 + ‖x‖ ^ 2))⁻¹ • x invFun y := (√(1 - ‖(y : E)‖ ^ 2))⁻¹ • (y : E) source := univ target := ball 0 1 map_source' x _ := by have : 0 < 1 + ‖x‖ ^ 2 := by positivity rw [mem_ball_zero_iff, norm_smul, Real.norm_eq_abs, abs_inv, ← _root_.div_eq_inv_mul, div_lt_one (abs_pos.mpr <\| Real.sqrt_ne_zero'.mpr this), ← abs_norm x, ← sq_lt_sq, abs_norm, Real.sq_sqrt this.le] exact lt_one_add _ map_target' _ _ := trivial left_inv' x _ := by field_simp [norm_smul, smul_smul, (zero_lt_one_add_norm_sq x).ne', sq_abs, Real.sq_sqrt (zero_lt_one_add_norm_sq x).le, ← Real.sqrt_div (zero_lt_one_add_norm_sq x).le] right_inv' y hy := by have : 0 < 1 - ‖y‖ ^ 2 := by nlinarith [norm_nonneg y, mem_ball_zero_iff.1 hy] field_simp [norm_smul, smul_smul, this.ne', sq_abs, Real.sq_sqrt this.le, ← Real.sqrt_div this.le] open_source := isOpen_univ open_target := isOpen_ball continuousOn_toFun := by suffices Continuous fun (x:E) => (√(1 + ‖x‖ ^ 2))⁻¹ from (this.smul continuous_id).continuousOn refine Continuous.inv₀ ?_ fun x => Real.sqrt_ne_zero'.mpr (by positivity) continuity continuousOn_invFun := by have : ∀ y ∈ ball (0 : E) 1, √(1 - ‖(y : E)‖ ^ 2) ≠ 0 := fun y hy ↦ by rw [Real.sqrt_ne_zero'] nlinarith [norm_nonneg y, mem_ball_zero_iff.1 hy] exact ContinuousOn.smul (ContinuousOn.inv₀ (continuousOn_const.sub (continuous_norm.continuousOn.pow _)).sqrt this) continuousOn_id @[simp] theorem PartialHomeomorph.univUnitBall_apply_zero : univUnitBall (0 : E) = 0 := by simp [PartialHomeomorph.univUnitBall_apply] @[simp] theorem PartialHomeomorph.univUnitBall_symm_apply_zero : univUnitBall.symm (0 : E) = 0 := by simp [PartialHomeomorph.univUnitBall_symm_apply] @[simps! (config := .lemmasOnly)] def Homeomorph.unitBall : E ≃ₜ ball (0 : E) 1 := (Homeomorph.Set.univ _).symm.trans PartialHomeomorph.univUnitBall.toHomeomorphSourceTarget #align homeomorph_unit_ball Homeomorph.unitBall @[simp] theorem Homeomorph.coe_unitBall_apply_zero : (Homeomorph.unitBall (0 : E) : E) = 0 := PartialHomeomorph.univUnitBall_apply_zero #align coe_homeomorph_unit_ball_apply_zero Homeomorph.coe_unitBall_apply_zero variable {P : Type} [PseudoMetricSpace P] [NormedAddTorsor E P] namespace PartialHomeomorph @[simps!] def unitBallBall (c : P) (r : ℝ) (hr : 0 < r) : PartialHomeomorph E P := ((Homeomorph.smulOfNeZero r hr.ne').trans (IsometryEquiv.vaddConst c).toHomeomorph).toPartialHomeomorphOfImageEq (ball 0 1) isOpen_ball (ball c r) <\| by change (IsometryEquiv.vaddConst c) ∘ (r • ·) '' ball (0 : E) 1 = ball c r rw [image_comp, image_smul, smul_unitBall hr.ne', IsometryEquiv.image_ball] simp [abs_of_pos hr] def univBall (c : P) (r : ℝ) : PartialHomeomorph E P := if h : 0 < r then univUnitBall.trans' (unitBallBall c r h) rfl else (IsometryEquiv.vaddConst c).toHomeomorph.toPartialHomeomorph @[simp]	Mathlib/Analysis/NormedSpace/HomeomorphBall.lean	127	128	theorem univBall_source (c : P) (r : ℝ) : (univBall c r).source = univ := by	unfold univBall; split_ifs <;> rfl
import Mathlib.Algebra.Polynomial.Degree.Definitions import Mathlib.Algebra.Polynomial.Eval import Mathlib.Algebra.Polynomial.Monic import Mathlib.Algebra.Polynomial.RingDivision import Mathlib.Tactic.Abel #align_import ring_theory.polynomial.pochhammer from "leanprover-community/mathlib"@"53b216bcc1146df1c4a0a86877890ea9f1f01589" universe u v open Polynomial open Polynomial section Ring variable (R : Type u) [Ring R] noncomputable def descPochhammer : ℕ → R[X] \| 0 => 1 \| n + 1 => X * (descPochhammer n).comp (X - 1) @[simp] theorem descPochhammer_zero : descPochhammer R 0 = 1 := rfl @[simp] theorem descPochhammer_one : descPochhammer R 1 = X := by simp [descPochhammer] theorem descPochhammer_succ_left (n : ℕ) : descPochhammer R (n + 1) = X * (descPochhammer R n).comp (X - 1) := by rw [descPochhammer] theorem monic_descPochhammer (n : ℕ) [Nontrivial R] [NoZeroDivisors R] : Monic <\| descPochhammer R n := by induction' n with n hn · simp · have h : leadingCoeff (X - 1 : R[X]) = 1 := leadingCoeff_X_sub_C 1 have : natDegree (X - (1 : R[X])) ≠ 0 := ne_zero_of_eq_one <\| natDegree_X_sub_C (1 : R) rw [descPochhammer_succ_left, Monic.def, leadingCoeff_mul, leadingCoeff_comp this, hn, monic_X, one_mul, one_mul, h, one_pow] section variable {R} {T : Type v} [Ring T] @[simp] theorem descPochhammer_map (f : R →+* T) (n : ℕ) : (descPochhammer R n).map f = descPochhammer T n := by induction' n with n ih · simp · simp [ih, descPochhammer_succ_left, map_comp] end @[simp, norm_cast] theorem descPochhammer_eval_cast (n : ℕ) (k : ℤ) : (((descPochhammer ℤ n).eval k : ℤ) : R) = ((descPochhammer R n).eval k : R) := by rw [← descPochhammer_map (algebraMap ℤ R), eval_map, ← eq_intCast (algebraMap ℤ R)] simp only [algebraMap_int_eq, eq_intCast, eval₂_at_intCast, Nat.cast_id, eq_natCast, Int.cast_id] theorem descPochhammer_eval_zero {n : ℕ} : (descPochhammer R n).eval 0 = if n = 0 then 1 else 0 := by cases n · simp · simp [X_mul, Nat.succ_ne_zero, descPochhammer_succ_left] theorem descPochhammer_zero_eval_zero : (descPochhammer R 0).eval 0 = 1 := by simp @[simp] theorem descPochhammer_ne_zero_eval_zero {n : ℕ} (h : n ≠ 0) : (descPochhammer R n).eval 0 = 0 := by simp [descPochhammer_eval_zero, h]	Mathlib/RingTheory/Polynomial/Pochhammer.lean	301	312	theorem descPochhammer_succ_right (n : ℕ) : descPochhammer R (n + 1) = descPochhammer R n * (X - (n : R[X])) := by	suffices h : descPochhammer ℤ (n + 1) = descPochhammer ℤ n * (X - (n : ℤ[X])) by apply_fun Polynomial.map (algebraMap ℤ R) at h simpa [descPochhammer_map, Polynomial.map_mul, Polynomial.map_add, map_X, Polynomial.map_intCast] using h induction' n with n ih · simp [descPochhammer] · conv_lhs => rw [descPochhammer_succ_left, ih, mul_comp, ← mul_assoc, ← descPochhammer_succ_left, sub_comp, X_comp, natCast_comp] rw [Nat.cast_add, Nat.cast_one, sub_add_eq_sub_sub_swap]
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	Mathlib/MeasureTheory/Measure/MeasureSpace.lean	549	571	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'
import Mathlib.Algebra.CharZero.Defs import Mathlib.Algebra.Group.Pi.Basic import Mathlib.Algebra.Group.Units import Mathlib.Algebra.GroupWithZero.NeZero import Mathlib.Algebra.Order.Group.Defs import Mathlib.Algebra.Order.GroupWithZero.Unbundled import Mathlib.Algebra.Order.Monoid.Canonical.Defs import Mathlib.Algebra.Order.Monoid.NatCast import Mathlib.Algebra.Order.Monoid.Unbundled.MinMax import Mathlib.Algebra.Ring.Defs import Mathlib.Tactic.Tauto #align_import algebra.order.ring.char_zero from "leanprover-community/mathlib"@"655994e298904d7e5bbd1e18c95defd7b543eb94" #align_import algebra.order.ring.defs from "leanprover-community/mathlib"@"44e29dbcff83ba7114a464d592b8c3743987c1e5" open Function universe u variable {α : Type u} {β : Type} theorem add_one_le_two_mul [LE α] [Semiring α] [CovariantClass α α (· + ·) (· ≤ ·)] {a : α} (a1 : 1 ≤ a) : a + 1 ≤ 2 a := calc a + 1 ≤ a + a := add_le_add_left a1 a _ = 2 * a := (two_mul _).symm #align add_one_le_two_mul add_one_le_two_mul class OrderedSemiring (α : Type u) extends Semiring α, OrderedAddCommMonoid α where protected zero_le_one : (0 : α) ≤ 1 protected mul_le_mul_of_nonneg_left : ∀ a b c : α, a ≤ b → 0 ≤ c → c * a ≤ c * b protected mul_le_mul_of_nonneg_right : ∀ a b c : α, a ≤ b → 0 ≤ c → a * c ≤ b * c #align ordered_semiring OrderedSemiring class OrderedCommSemiring (α : Type u) extends OrderedSemiring α, CommSemiring α where mul_le_mul_of_nonneg_right a b c ha hc := -- parentheses ensure this generates an `optParam` rather than an `autoParam` (by simpa only [mul_comm] using mul_le_mul_of_nonneg_left a b c ha hc) #align ordered_comm_semiring OrderedCommSemiring class OrderedRing (α : Type u) extends Ring α, OrderedAddCommGroup α where protected zero_le_one : 0 ≤ (1 : α) protected mul_nonneg : ∀ a b : α, 0 ≤ a → 0 ≤ b → 0 ≤ a * b #align ordered_ring OrderedRing class OrderedCommRing (α : Type u) extends OrderedRing α, CommRing α #align ordered_comm_ring OrderedCommRing class StrictOrderedSemiring (α : Type u) extends Semiring α, OrderedCancelAddCommMonoid α, Nontrivial α where protected zero_le_one : (0 : α) ≤ 1 protected mul_lt_mul_of_pos_left : ∀ a b c : α, a < b → 0 < c → c * a < c * b protected mul_lt_mul_of_pos_right : ∀ a b c : α, a < b → 0 < c → a * c < b * c #align strict_ordered_semiring StrictOrderedSemiring class StrictOrderedCommSemiring (α : Type u) extends StrictOrderedSemiring α, CommSemiring α #align strict_ordered_comm_semiring StrictOrderedCommSemiring class StrictOrderedRing (α : Type u) extends Ring α, OrderedAddCommGroup α, Nontrivial α where protected zero_le_one : 0 ≤ (1 : α) protected mul_pos : ∀ a b : α, 0 < a → 0 < b → 0 < a * b #align strict_ordered_ring StrictOrderedRing class StrictOrderedCommRing (α : Type) extends StrictOrderedRing α, CommRing α #align strict_ordered_comm_ring StrictOrderedCommRing class LinearOrderedSemiring (α : Type u) extends StrictOrderedSemiring α, LinearOrderedAddCommMonoid α #align linear_ordered_semiring LinearOrderedSemiring class LinearOrderedCommSemiring (α : Type) extends StrictOrderedCommSemiring α, LinearOrderedSemiring α #align linear_ordered_comm_semiring LinearOrderedCommSemiring class LinearOrderedRing (α : Type u) extends StrictOrderedRing α, LinearOrder α #align linear_ordered_ring LinearOrderedRing class LinearOrderedCommRing (α : Type u) extends LinearOrderedRing α, CommMonoid α #align linear_ordered_comm_ring LinearOrderedCommRing section OrderedSemiring variable [OrderedSemiring α] {a b c d : α} -- see Note [lower instance priority] instance (priority := 100) OrderedSemiring.zeroLEOneClass : ZeroLEOneClass α := { ‹OrderedSemiring α› with } #align ordered_semiring.zero_le_one_class OrderedSemiring.zeroLEOneClass -- see Note [lower instance priority] instance (priority := 200) OrderedSemiring.toPosMulMono : PosMulMono α := ⟨fun x _ _ h => OrderedSemiring.mul_le_mul_of_nonneg_left _ _ _ h x.2⟩ #align ordered_semiring.to_pos_mul_mono OrderedSemiring.toPosMulMono -- see Note [lower instance priority] instance (priority := 200) OrderedSemiring.toMulPosMono : MulPosMono α := ⟨fun x _ _ h => OrderedSemiring.mul_le_mul_of_nonneg_right _ _ _ h x.2⟩ #align ordered_semiring.to_mul_pos_mono OrderedSemiring.toMulPosMono set_option linter.deprecated false in theorem bit1_mono : Monotone (bit1 : α → α) := fun _ _ h => add_le_add_right (bit0_mono h) _ #align bit1_mono bit1_mono @[simp] theorem pow_nonneg (H : 0 ≤ a) : ∀ n : ℕ, 0 ≤ a ^ n \| 0 => by rw [pow_zero] exact zero_le_one \| n + 1 => by rw [pow_succ] exact mul_nonneg (pow_nonneg H _) H #align pow_nonneg pow_nonneg lemma pow_le_pow_of_le_one (ha₀ : 0 ≤ a) (ha₁ : a ≤ 1) : ∀ {m n : ℕ}, m ≤ n → a ^ n ≤ a ^ m \| _, _, Nat.le.refl => le_rfl \| _, _, Nat.le.step h => by rw [pow_succ'] exact (mul_le_of_le_one_left (pow_nonneg ha₀ _) ha₁).trans $ pow_le_pow_of_le_one ha₀ ha₁ h #align pow_le_pow_of_le_one pow_le_pow_of_le_one lemma pow_le_of_le_one (h₀ : 0 ≤ a) (h₁ : a ≤ 1) {n : ℕ} (hn : n ≠ 0) : a ^ n ≤ a := (pow_one a).subst (pow_le_pow_of_le_one h₀ h₁ (Nat.pos_of_ne_zero hn)) #align pow_le_of_le_one pow_le_of_le_one lemma sq_le (h₀ : 0 ≤ a) (h₁ : a ≤ 1) : a ^ 2 ≤ a := pow_le_of_le_one h₀ h₁ two_ne_zero #align sq_le sq_le -- Porting note: it's unfortunate we need to write `(@one_le_two α)` here.	Mathlib/Algebra/Order/Ring/Defs.lean	267	271	theorem add_le_mul_two_add (a2 : 2 ≤ a) (b0 : 0 ≤ b) : a + (2 + b) ≤ a * (2 + b) := calc a + (2 + b) ≤ a + (a + a * b) := add_le_add_left (add_le_add a2 <\| le_mul_of_one_le_left b0 <\| (@one_le_two α).trans a2) a _ ≤ a * (2 + b) := by	rw [mul_add, mul_two, add_assoc]
import Mathlib.Algebra.Polynomial.Eval import Mathlib.LinearAlgebra.Dimension.Constructions #align_import algebra.linear_recurrence from "leanprover-community/mathlib"@"039a089d2a4b93c761b234f3e5f5aeb752bac60f" noncomputable section open Finset open Polynomial structure LinearRecurrence (α : Type) [CommSemiring α] where order : ℕ coeffs : Fin order → α #align linear_recurrence LinearRecurrence instance (α : Type) [CommSemiring α] : Inhabited (LinearRecurrence α) := ⟨⟨0, default⟩⟩ namespace LinearRecurrence section CommSemiring variable {α : Type} [CommSemiring α] (E : LinearRecurrence α) def IsSolution (u : ℕ → α) := ∀ n, u (n + E.order) = ∑ i, E.coeffs i u (n + i) #align linear_recurrence.is_solution LinearRecurrence.IsSolution def mkSol (init : Fin E.order → α) : ℕ → α \| n => if h : n < E.order then init ⟨n, h⟩ else ∑ k : Fin E.order, have _ : n - E.order + k < n := by rw [add_comm, ← add_tsub_assoc_of_le (not_lt.mp h), tsub_lt_iff_left] · exact add_lt_add_right k.is_lt n · convert add_le_add (zero_le (k : ℕ)) (not_lt.mp h) simp only [zero_add] E.coeffs k * mkSol init (n - E.order + k) #align linear_recurrence.mk_sol LinearRecurrence.mkSol	Mathlib/Algebra/LinearRecurrence.lean	85	88	theorem is_sol_mkSol (init : Fin E.order → α) : E.IsSolution (E.mkSol init) := by	intro n rw [mkSol] simp
import Mathlib.Algebra.Group.Hom.Defs import Mathlib.Data.Set.Lattice import Mathlib.Data.SetLike.Basic #align_import group_theory.subsemigroup.basic from "leanprover-community/mathlib"@"feb99064803fd3108e37c18b0f77d0a8344677a3" assert_not_exists MonoidWithZero -- Only needed for notation variable {M : Type} {N : Type} {A : Type} section NonAssoc variable [Mul M] {s : Set M} variable [Add A] {t : Set A} class MulMemClass (S : Type) (M : Type) [Mul M] [SetLike S M] : Prop where mul_mem : ∀ {s : S} {a b : M}, a ∈ s → b ∈ s → a b ∈ s #align mul_mem_class MulMemClass export MulMemClass (mul_mem) class AddMemClass (S : Type) (M : Type) [Add M] [SetLike S M] : Prop where add_mem : ∀ {s : S} {a b : M}, a ∈ s → b ∈ s → a + b ∈ s #align add_mem_class AddMemClass export AddMemClass (add_mem) attribute [to_additive] MulMemClass attribute [aesop safe apply (rule_sets := [SetLike])] mul_mem add_mem structure Subsemigroup (M : Type) [Mul M] where carrier : Set M mul_mem' {a b} : a ∈ carrier → b ∈ carrier → a b ∈ carrier #align subsemigroup Subsemigroup structure AddSubsemigroup (M : Type) [Add M] where carrier : Set M add_mem' {a b} : a ∈ carrier → b ∈ carrier → a + b ∈ carrier #align add_subsemigroup AddSubsemigroup attribute [to_additive AddSubsemigroup] Subsemigroup namespace Subsemigroup @[to_additive] instance : SetLike (Subsemigroup M) M := ⟨Subsemigroup.carrier, fun p q h => by cases p; cases q; congr⟩ @[to_additive] instance : MulMemClass (Subsemigroup M) M where mul_mem := fun {_ _ _} => Subsemigroup.mul_mem' _ initialize_simps_projections Subsemigroup (carrier → coe) initialize_simps_projections AddSubsemigroup (carrier → coe) @[to_additive (attr := simp)] theorem mem_carrier {s : Subsemigroup M} {x : M} : x ∈ s.carrier ↔ x ∈ s := Iff.rfl #align subsemigroup.mem_carrier Subsemigroup.mem_carrier #align add_subsemigroup.mem_carrier AddSubsemigroup.mem_carrier @[to_additive (attr := simp)] theorem mem_mk {s : Set M} {x : M} (h_mul) : x ∈ mk s h_mul ↔ x ∈ s := Iff.rfl #align subsemigroup.mem_mk Subsemigroup.mem_mk #align add_subsemigroup.mem_mk AddSubsemigroup.mem_mk @[to_additive (attr := simp, norm_cast)] theorem coe_set_mk {s : Set M} (h_mul) : (mk s h_mul : Set M) = s := rfl #align subsemigroup.coe_set_mk Subsemigroup.coe_set_mk #align add_subsemigroup.coe_set_mk AddSubsemigroup.coe_set_mk @[to_additive (attr := simp)] theorem mk_le_mk {s t : Set M} (h_mul) (h_mul') : mk s h_mul ≤ mk t h_mul' ↔ s ⊆ t := Iff.rfl #align subsemigroup.mk_le_mk Subsemigroup.mk_le_mk #align add_subsemigroup.mk_le_mk AddSubsemigroup.mk_le_mk @[to_additive (attr := ext) "Two `AddSubsemigroup`s are equal if they have the same elements."] theorem ext {S T : Subsemigroup M} (h : ∀ x, x ∈ S ↔ x ∈ T) : S = T := SetLike.ext h #align subsemigroup.ext Subsemigroup.ext #align add_subsemigroup.ext AddSubsemigroup.ext @[to_additive "Copy an additive subsemigroup replacing `carrier` with a set that is equal to it."] protected def copy (S : Subsemigroup M) (s : Set M) (hs : s = S) : Subsemigroup M where carrier := s mul_mem' := hs.symm ▸ S.mul_mem' #align subsemigroup.copy Subsemigroup.copy #align add_subsemigroup.copy AddSubsemigroup.copy variable {S : Subsemigroup M} @[to_additive (attr := simp)] theorem coe_copy {s : Set M} (hs : s = S) : (S.copy s hs : Set M) = s := rfl #align subsemigroup.coe_copy Subsemigroup.coe_copy #align add_subsemigroup.coe_copy AddSubsemigroup.coe_copy @[to_additive] theorem copy_eq {s : Set M} (hs : s = S) : S.copy s hs = S := SetLike.coe_injective hs #align subsemigroup.copy_eq Subsemigroup.copy_eq #align add_subsemigroup.copy_eq AddSubsemigroup.copy_eq variable (S) @[to_additive "An `AddSubsemigroup` is closed under addition."] protected theorem mul_mem {x y : M} : x ∈ S → y ∈ S → x y ∈ S := Subsemigroup.mul_mem' S #align subsemigroup.mul_mem Subsemigroup.mul_mem #align add_subsemigroup.add_mem AddSubsemigroup.add_mem @[to_additive "The additive subsemigroup `M` of the magma `M`."] instance : Top (Subsemigroup M) := ⟨{ carrier := Set.univ mul_mem' := fun _ _ => Set.mem_univ _ }⟩ @[to_additive "The trivial `AddSubsemigroup` `∅` of an additive magma `M`."] instance : Bot (Subsemigroup M) := ⟨{ carrier := ∅ mul_mem' := False.elim }⟩ @[to_additive] instance : Inhabited (Subsemigroup M) := ⟨⊥⟩ @[to_additive] theorem not_mem_bot {x : M} : x ∉ (⊥ : Subsemigroup M) := Set.not_mem_empty x #align subsemigroup.not_mem_bot Subsemigroup.not_mem_bot #align add_subsemigroup.not_mem_bot AddSubsemigroup.not_mem_bot @[to_additive (attr := simp)] theorem mem_top (x : M) : x ∈ (⊤ : Subsemigroup M) := Set.mem_univ x #align subsemigroup.mem_top Subsemigroup.mem_top #align add_subsemigroup.mem_top AddSubsemigroup.mem_top @[to_additive (attr := simp)] theorem coe_top : ((⊤ : Subsemigroup M) : Set M) = Set.univ := rfl #align subsemigroup.coe_top Subsemigroup.coe_top #align add_subsemigroup.coe_top AddSubsemigroup.coe_top @[to_additive (attr := simp)] theorem coe_bot : ((⊥ : Subsemigroup M) : Set M) = ∅ := rfl #align subsemigroup.coe_bot Subsemigroup.coe_bot #align add_subsemigroup.coe_bot AddSubsemigroup.coe_bot @[to_additive "The inf of two `AddSubsemigroup`s is their intersection."] instance : Inf (Subsemigroup M) := ⟨fun S₁ S₂ => { carrier := S₁ ∩ S₂ mul_mem' := fun ⟨hx, hx'⟩ ⟨hy, hy'⟩ => ⟨S₁.mul_mem hx hy, S₂.mul_mem hx' hy'⟩ }⟩ @[to_additive (attr := simp)] theorem coe_inf (p p' : Subsemigroup M) : ((p ⊓ p' : Subsemigroup M) : Set M) = (p : Set M) ∩ p' := rfl #align subsemigroup.coe_inf Subsemigroup.coe_inf #align add_subsemigroup.coe_inf AddSubsemigroup.coe_inf @[to_additive (attr := simp)] theorem mem_inf {p p' : Subsemigroup M} {x : M} : x ∈ p ⊓ p' ↔ x ∈ p ∧ x ∈ p' := Iff.rfl #align subsemigroup.mem_inf Subsemigroup.mem_inf #align add_subsemigroup.mem_inf AddSubsemigroup.mem_inf @[to_additive] instance : InfSet (Subsemigroup M) := ⟨fun s => { carrier := ⋂ t ∈ s, ↑t mul_mem' := fun hx hy => Set.mem_biInter fun i h => i.mul_mem (by apply Set.mem_iInter₂.1 hx i h) (by apply Set.mem_iInter₂.1 hy i h) }⟩ @[to_additive (attr := simp, norm_cast)] theorem coe_sInf (S : Set (Subsemigroup M)) : ((sInf S : Subsemigroup M) : Set M) = ⋂ s ∈ S, ↑s := rfl #align subsemigroup.coe_Inf Subsemigroup.coe_sInf #align add_subsemigroup.coe_Inf AddSubsemigroup.coe_sInf @[to_additive] theorem mem_sInf {S : Set (Subsemigroup M)} {x : M} : x ∈ sInf S ↔ ∀ p ∈ S, x ∈ p := Set.mem_iInter₂ #align subsemigroup.mem_Inf Subsemigroup.mem_sInf #align add_subsemigroup.mem_Inf AddSubsemigroup.mem_sInf @[to_additive] theorem mem_iInf {ι : Sort} {S : ι → Subsemigroup M} {x : M} : (x ∈ ⨅ i, S i) ↔ ∀ i, x ∈ S i := by simp only [iInf, mem_sInf, Set.forall_mem_range] #align subsemigroup.mem_infi Subsemigroup.mem_iInf #align add_subsemigroup.mem_infi AddSubsemigroup.mem_iInf @[to_additive (attr := simp, norm_cast)] theorem coe_iInf {ι : Sort} {S : ι → Subsemigroup M} : (↑(⨅ i, S i) : Set M) = ⋂ i, S i := by simp only [iInf, coe_sInf, Set.biInter_range] #align subsemigroup.coe_infi Subsemigroup.coe_iInf #align add_subsemigroup.coe_infi AddSubsemigroup.coe_iInf @[to_additive "The `AddSubsemigroup`s of an `AddMonoid` form a complete lattice."] instance : CompleteLattice (Subsemigroup M) := { completeLatticeOfInf (Subsemigroup M) fun _ => IsGLB.of_image SetLike.coe_subset_coe isGLB_biInf with le := (· ≤ ·) lt := (· < ·) bot := ⊥ bot_le := fun _ _ hx => (not_mem_bot hx).elim top := ⊤ le_top := fun _ x _ => mem_top x inf := (· ⊓ ·) sInf := InfSet.sInf le_inf := fun _ _ _ ha hb _ hx => ⟨ha hx, hb hx⟩ inf_le_left := fun _ _ _ => And.left inf_le_right := fun _ _ _ => And.right } @[to_additive] theorem subsingleton_of_subsingleton [Subsingleton (Subsemigroup M)] : Subsingleton M := by constructor; intro x y have : ∀ a : M, a ∈ (⊥ : Subsemigroup M) := by simp [Subsingleton.elim (⊥ : Subsemigroup M) ⊤] exact absurd (this x) not_mem_bot #align subsemigroup.subsingleton_of_subsingleton Subsemigroup.subsingleton_of_subsingleton #align add_subsemigroup.subsingleton_of_subsingleton AddSubsemigroup.subsingleton_of_subsingleton @[to_additive] instance [hn : Nonempty M] : Nontrivial (Subsemigroup M) := ⟨⟨⊥, ⊤, fun h => by obtain ⟨x⟩ := id hn refine absurd (?_ : x ∈ ⊥) not_mem_bot simp [h]⟩⟩ @[to_additive "The `AddSubsemigroup` generated by a set"] def closure (s : Set M) : Subsemigroup M := sInf { S \| s ⊆ S } #align subsemigroup.closure Subsemigroup.closure #align add_subsemigroup.closure AddSubsemigroup.closure @[to_additive] theorem mem_closure {x : M} : x ∈ closure s ↔ ∀ S : Subsemigroup M, s ⊆ S → x ∈ S := mem_sInf #align subsemigroup.mem_closure Subsemigroup.mem_closure #align add_subsemigroup.mem_closure AddSubsemigroup.mem_closure @[to_additive (attr := simp, aesop safe 20 apply (rule_sets := [SetLike])) "The `AddSubsemigroup` generated by a set includes the set."] theorem subset_closure : s ⊆ closure s := fun _ hx => mem_closure.2 fun _ hS => hS hx #align subsemigroup.subset_closure Subsemigroup.subset_closure #align add_subsemigroup.subset_closure AddSubsemigroup.subset_closure @[to_additive] theorem not_mem_of_not_mem_closure {P : M} (hP : P ∉ closure s) : P ∉ s := fun h => hP (subset_closure h) #align subsemigroup.not_mem_of_not_mem_closure Subsemigroup.not_mem_of_not_mem_closure #align add_subsemigroup.not_mem_of_not_mem_closure AddSubsemigroup.not_mem_of_not_mem_closure variable {S} open Set @[to_additive (attr := simp) "An additive subsemigroup `S` includes `closure s` if and only if it includes `s`"] theorem closure_le : closure s ≤ S ↔ s ⊆ S := ⟨Subset.trans subset_closure, fun h => sInf_le h⟩ #align subsemigroup.closure_le Subsemigroup.closure_le #align add_subsemigroup.closure_le AddSubsemigroup.closure_le @[to_additive "Additive subsemigroup closure of a set is monotone in its argument: if `s ⊆ t`, then `closure s ≤ closure t`"] theorem closure_mono ⦃s t : Set M⦄ (h : s ⊆ t) : closure s ≤ closure t := closure_le.2 <\| Subset.trans h subset_closure #align subsemigroup.closure_mono Subsemigroup.closure_mono #align add_subsemigroup.closure_mono AddSubsemigroup.closure_mono @[to_additive] theorem closure_eq_of_le (h₁ : s ⊆ S) (h₂ : S ≤ closure s) : closure s = S := le_antisymm (closure_le.2 h₁) h₂ #align subsemigroup.closure_eq_of_le Subsemigroup.closure_eq_of_le #align add_subsemigroup.closure_eq_of_le AddSubsemigroup.closure_eq_of_le variable (S) @[to_additive (attr := elab_as_elim) "An induction principle for additive closure membership. If `p` holds for all elements of `s`, and is preserved under addition, then `p` holds for all elements of the additive closure of `s`."] theorem closure_induction {p : M → Prop} {x} (h : x ∈ closure s) (mem : ∀ x ∈ s, p x) (mul : ∀ x y, p x → p y → p (x * y)) : p x := (@closure_le _ _ _ ⟨p, mul _ _⟩).2 mem h #align subsemigroup.closure_induction Subsemigroup.closure_induction #align add_subsemigroup.closure_induction AddSubsemigroup.closure_induction @[to_additive (attr := elab_as_elim) "A dependent version of `AddSubsemigroup.closure_induction`. "] theorem closure_induction' (s : Set M) {p : ∀ x, x ∈ closure s → Prop} (mem : ∀ (x) (h : x ∈ s), p x (subset_closure h)) (mul : ∀ x hx y hy, p x hx → p y hy → p (x * y) (mul_mem hx hy)) {x} (hx : x ∈ closure s) : p x hx := by refine Exists.elim ?_ fun (hx : x ∈ closure s) (hc : p x hx) => hc exact closure_induction hx (fun x hx => ⟨_, mem x hx⟩) fun x y ⟨hx', hx⟩ ⟨hy', hy⟩ => ⟨_, mul _ _ _ _ hx hy⟩ #align subsemigroup.closure_induction' Subsemigroup.closure_induction' #align add_subsemigroup.closure_induction' AddSubsemigroup.closure_induction' @[to_additive (attr := elab_as_elim) "An induction principle for additive closure membership for predicates with two arguments."] theorem closure_induction₂ {p : M → M → Prop} {x} {y : M} (hx : x ∈ closure s) (hy : y ∈ closure s) (Hs : ∀ x ∈ s, ∀ y ∈ s, p x y) (Hmul_left : ∀ x y z, p x z → p y z → p (x * y) z) (Hmul_right : ∀ x y z, p z x → p z y → p z (x * y)) : p x y := closure_induction hx (fun x xs => closure_induction hy (Hs x xs) fun z _ h₁ h₂ => Hmul_right z _ _ h₁ h₂) fun _ _ h₁ h₂ => Hmul_left _ _ _ h₁ h₂ #align subsemigroup.closure_induction₂ Subsemigroup.closure_induction₂ #align add_subsemigroup.closure_induction₂ AddSubsemigroup.closure_induction₂ @[to_additive (attr := elab_as_elim) "If `s` is a dense set in an additive monoid `M`, `AddSubsemigroup.closure s = ⊤`, then in order to prove that some predicate `p` holds for all `x : M` it suffices to verify `p x` for `x ∈ s`, and verify that `p x` and `p y` imply `p (x + y)`."] theorem dense_induction {p : M → Prop} (x : M) {s : Set M} (hs : closure s = ⊤) (mem : ∀ x ∈ s, p x) (mul : ∀ x y, p x → p y → p (x * y)) : p x := by have : ∀ x ∈ closure s, p x := fun x hx => closure_induction hx mem mul simpa [hs] using this x #align subsemigroup.dense_induction Subsemigroup.dense_induction #align add_subsemigroup.dense_induction AddSubsemigroup.dense_induction variable (M) @[to_additive "`closure` forms a Galois insertion with the coercion to set."] protected def gi : GaloisInsertion (@closure M _) SetLike.coe := GaloisConnection.toGaloisInsertion (fun _ _ => closure_le) fun _ => subset_closure #align subsemigroup.gi Subsemigroup.gi #align add_subsemigroup.gi AddSubsemigroup.gi variable {M} @[to_additive (attr := simp) "Additive closure of an additive subsemigroup `S` equals `S`"] theorem closure_eq : closure (S : Set M) = S := (Subsemigroup.gi M).l_u_eq S #align subsemigroup.closure_eq Subsemigroup.closure_eq #align add_subsemigroup.closure_eq AddSubsemigroup.closure_eq @[to_additive (attr := simp)] theorem closure_empty : closure (∅ : Set M) = ⊥ := (Subsemigroup.gi M).gc.l_bot #align subsemigroup.closure_empty Subsemigroup.closure_empty #align add_subsemigroup.closure_empty AddSubsemigroup.closure_empty @[to_additive (attr := simp)] theorem closure_univ : closure (univ : Set M) = ⊤ := @coe_top M _ ▸ closure_eq ⊤ #align subsemigroup.closure_univ Subsemigroup.closure_univ #align add_subsemigroup.closure_univ AddSubsemigroup.closure_univ @[to_additive] theorem closure_union (s t : Set M) : closure (s ∪ t) = closure s ⊔ closure t := (Subsemigroup.gi M).gc.l_sup #align subsemigroup.closure_union Subsemigroup.closure_union #align add_subsemigroup.closure_union AddSubsemigroup.closure_union @[to_additive] theorem closure_iUnion {ι} (s : ι → Set M) : closure (⋃ i, s i) = ⨆ i, closure (s i) := (Subsemigroup.gi M).gc.l_iSup #align subsemigroup.closure_Union Subsemigroup.closure_iUnion #align add_subsemigroup.closure_Union AddSubsemigroup.closure_iUnion @[to_additive] theorem closure_singleton_le_iff_mem (m : M) (p : Subsemigroup M) : closure {m} ≤ p ↔ m ∈ p := by rw [closure_le, singleton_subset_iff, SetLike.mem_coe] #align subsemigroup.closure_singleton_le_iff_mem Subsemigroup.closure_singleton_le_iff_mem #align add_subsemigroup.closure_singleton_le_iff_mem AddSubsemigroup.closure_singleton_le_iff_mem @[to_additive] theorem mem_iSup {ι : Sort*} (p : ι → Subsemigroup M) {m : M} : (m ∈ ⨆ i, p i) ↔ ∀ N, (∀ i, p i ≤ N) → m ∈ N := by rw [← closure_singleton_le_iff_mem, le_iSup_iff] simp only [closure_singleton_le_iff_mem] #align subsemigroup.mem_supr Subsemigroup.mem_iSup #align add_subsemigroup.mem_supr AddSubsemigroup.mem_iSup @[to_additive]	Mathlib/Algebra/Group/Subsemigroup/Basic.lean	460	462	theorem iSup_eq_closure {ι : Sort*} (p : ι → Subsemigroup M) : ⨆ i, p i = Subsemigroup.closure (⋃ i, (p i : Set M)) := by	simp_rw [Subsemigroup.closure_iUnion, Subsemigroup.closure_eq]
import Mathlib.Analysis.BoxIntegral.Partition.SubboxInduction import Mathlib.Analysis.BoxIntegral.Partition.Split #align_import analysis.box_integral.partition.filter from "leanprover-community/mathlib"@"92ca63f0fb391a9ca5f22d2409a6080e786d99f7" open Set Function Filter Metric Finset Bool open scoped Classical open Topology Filter NNReal noncomputable section namespace BoxIntegral variable {ι : Type} [Fintype ι] {I J : Box ι} {c c₁ c₂ : ℝ≥0} {r r₁ r₂ : (ι → ℝ) → Ioi (0 : ℝ)} {π π₁ π₂ : TaggedPrepartition I} open TaggedPrepartition @[ext] structure IntegrationParams : Type where (bRiemann bHenstock bDistortion : Bool) #align box_integral.integration_params BoxIntegral.IntegrationParams variable {l l₁ l₂ : IntegrationParams} namespace IntegrationParams def equivProd : IntegrationParams ≃ Bool × Boolᵒᵈ × Boolᵒᵈ where toFun l := ⟨l.1, OrderDual.toDual l.2, OrderDual.toDual l.3⟩ invFun l := ⟨l.1, OrderDual.ofDual l.2.1, OrderDual.ofDual l.2.2⟩ left_inv _ := rfl right_inv _ := rfl #align box_integral.integration_params.equiv_prod BoxIntegral.IntegrationParams.equivProd instance : PartialOrder IntegrationParams := PartialOrder.lift equivProd equivProd.injective def isoProd : IntegrationParams ≃o Bool × Boolᵒᵈ × Boolᵒᵈ := ⟨equivProd, Iff.rfl⟩ #align box_integral.integration_params.iso_prod BoxIntegral.IntegrationParams.isoProd instance : BoundedOrder IntegrationParams := isoProd.symm.toGaloisInsertion.liftBoundedOrder instance : Inhabited IntegrationParams := ⟨⊥⟩ instance : DecidableRel ((· ≤ ·) : IntegrationParams → IntegrationParams → Prop) := fun _ _ => And.decidable instance : DecidableEq IntegrationParams := fun x y => decidable_of_iff _ (IntegrationParams.ext_iff x y).symm def Riemann : IntegrationParams where bRiemann := true bHenstock := true bDistortion := false set_option linter.uppercaseLean3 false in #align box_integral.integration_params.Riemann BoxIntegral.IntegrationParams.Riemann def Henstock : IntegrationParams := ⟨false, true, false⟩ set_option linter.uppercaseLean3 false in #align box_integral.integration_params.Henstock BoxIntegral.IntegrationParams.Henstock def McShane : IntegrationParams := ⟨false, false, false⟩ set_option linter.uppercaseLean3 false in #align box_integral.integration_params.McShane BoxIntegral.IntegrationParams.McShane def GP : IntegrationParams := ⊥ set_option linter.uppercaseLean3 false in #align box_integral.integration_params.GP BoxIntegral.IntegrationParams.GP theorem henstock_le_riemann : Henstock ≤ Riemann := by trivial set_option linter.uppercaseLean3 false in #align box_integral.integration_params.Henstock_le_Riemann BoxIntegral.IntegrationParams.henstock_le_riemann theorem henstock_le_mcShane : Henstock ≤ McShane := by trivial set_option linter.uppercaseLean3 false in #align box_integral.integration_params.Henstock_le_McShane BoxIntegral.IntegrationParams.henstock_le_mcShane theorem gp_le : GP ≤ l := bot_le set_option linter.uppercaseLean3 false in #align box_integral.integration_params.GP_le BoxIntegral.IntegrationParams.gp_le structure MemBaseSet (l : IntegrationParams) (I : Box ι) (c : ℝ≥0) (r : (ι → ℝ) → Ioi (0 : ℝ)) (π : TaggedPrepartition I) : Prop where protected isSubordinate : π.IsSubordinate r protected isHenstock : l.bHenstock → π.IsHenstock protected distortion_le : l.bDistortion → π.distortion ≤ c protected exists_compl : l.bDistortion → ∃ π' : Prepartition I, π'.iUnion = ↑I \ π.iUnion ∧ π'.distortion ≤ c #align box_integral.integration_params.mem_base_set BoxIntegral.IntegrationParams.MemBaseSet def RCond {ι : Type} (l : IntegrationParams) (r : (ι → ℝ) → Ioi (0 : ℝ)) : Prop := l.bRiemann → ∀ x, r x = r 0 #align box_integral.integration_params.r_cond BoxIntegral.IntegrationParams.RCond def toFilterDistortion (l : IntegrationParams) (I : Box ι) (c : ℝ≥0) : Filter (TaggedPrepartition I) := ⨅ (r : (ι → ℝ) → Ioi (0 : ℝ)) (_ : l.RCond r), 𝓟 { π \| l.MemBaseSet I c r π } #align box_integral.integration_params.to_filter_distortion BoxIntegral.IntegrationParams.toFilterDistortion def toFilter (l : IntegrationParams) (I : Box ι) : Filter (TaggedPrepartition I) := ⨆ c : ℝ≥0, l.toFilterDistortion I c #align box_integral.integration_params.to_filter BoxIntegral.IntegrationParams.toFilter def toFilterDistortioniUnion (l : IntegrationParams) (I : Box ι) (c : ℝ≥0) (π₀ : Prepartition I) := l.toFilterDistortion I c ⊓ 𝓟 { π \| π.iUnion = π₀.iUnion } #align box_integral.integration_params.to_filter_distortion_Union BoxIntegral.IntegrationParams.toFilterDistortioniUnion def toFilteriUnion (l : IntegrationParams) (I : Box ι) (π₀ : Prepartition I) := ⨆ c : ℝ≥0, l.toFilterDistortioniUnion I c π₀ #align box_integral.integration_params.to_filter_Union BoxIntegral.IntegrationParams.toFilteriUnion theorem rCond_of_bRiemann_eq_false {ι} (l : IntegrationParams) (hl : l.bRiemann = false) {r : (ι → ℝ) → Ioi (0 : ℝ)} : l.RCond r := by simp [RCond, hl] set_option linter.uppercaseLean3 false in #align box_integral.integration_params.r_cond_of_bRiemann_eq_ff BoxIntegral.IntegrationParams.rCond_of_bRiemann_eq_false theorem toFilter_inf_iUnion_eq (l : IntegrationParams) (I : Box ι) (π₀ : Prepartition I) : l.toFilter I ⊓ 𝓟 { π \| π.iUnion = π₀.iUnion } = l.toFilteriUnion I π₀ := (iSup_inf_principal _ _).symm #align box_integral.integration_params.to_filter_inf_Union_eq BoxIntegral.IntegrationParams.toFilter_inf_iUnion_eq theorem MemBaseSet.mono' (I : Box ι) (h : l₁ ≤ l₂) (hc : c₁ ≤ c₂) {π : TaggedPrepartition I} (hr : ∀ J ∈ π, r₁ (π.tag J) ≤ r₂ (π.tag J)) (hπ : l₁.MemBaseSet I c₁ r₁ π) : l₂.MemBaseSet I c₂ r₂ π := ⟨hπ.1.mono' hr, fun h₂ => hπ.2 (le_iff_imp.1 h.2.1 h₂), fun hD => (hπ.3 (le_iff_imp.1 h.2.2 hD)).trans hc, fun hD => (hπ.4 (le_iff_imp.1 h.2.2 hD)).imp fun _ hπ => ⟨hπ.1, hπ.2.trans hc⟩⟩ #align box_integral.integration_params.mem_base_set.mono' BoxIntegral.IntegrationParams.MemBaseSet.mono' @[mono] theorem MemBaseSet.mono (I : Box ι) (h : l₁ ≤ l₂) (hc : c₁ ≤ c₂) {π : TaggedPrepartition I} (hr : ∀ x ∈ Box.Icc I, r₁ x ≤ r₂ x) (hπ : l₁.MemBaseSet I c₁ r₁ π) : l₂.MemBaseSet I c₂ r₂ π := hπ.mono' I h hc fun J _ => hr _ <\| π.tag_mem_Icc J #align box_integral.integration_params.mem_base_set.mono BoxIntegral.IntegrationParams.MemBaseSet.mono theorem MemBaseSet.exists_common_compl (h₁ : l.MemBaseSet I c₁ r₁ π₁) (h₂ : l.MemBaseSet I c₂ r₂ π₂) (hU : π₁.iUnion = π₂.iUnion) : ∃ π : Prepartition I, π.iUnion = ↑I \ π₁.iUnion ∧ (l.bDistortion → π.distortion ≤ c₁) ∧ (l.bDistortion → π.distortion ≤ c₂) := by wlog hc : c₁ ≤ c₂ with H · simpa [hU, _root_.and_comm] using @H _ _ I J c c₂ c₁ r r₂ r₁ π π₂ π₁ _ l₂ l₁ h₂ h₁ hU.symm (le_of_not_le hc) by_cases hD : (l.bDistortion : Prop) · rcases h₁.4 hD with ⟨π, hπU, hπc⟩ exact ⟨π, hπU, fun _ => hπc, fun _ => hπc.trans hc⟩ · exact ⟨π₁.toPrepartition.compl, π₁.toPrepartition.iUnion_compl, fun h => (hD h).elim, fun h => (hD h).elim⟩ #align box_integral.integration_params.mem_base_set.exists_common_compl BoxIntegral.IntegrationParams.MemBaseSet.exists_common_compl protected theorem MemBaseSet.unionComplToSubordinate (hπ₁ : l.MemBaseSet I c r₁ π₁) (hle : ∀ x ∈ Box.Icc I, r₂ x ≤ r₁ x) {π₂ : Prepartition I} (hU : π₂.iUnion = ↑I \ π₁.iUnion) (hc : l.bDistortion → π₂.distortion ≤ c) : l.MemBaseSet I c r₁ (π₁.unionComplToSubordinate π₂ hU r₂) := ⟨hπ₁.1.disjUnion ((π₂.isSubordinate_toSubordinate r₂).mono hle) _, fun h => (hπ₁.2 h).disjUnion (π₂.isHenstock_toSubordinate _) _, fun h => (distortion_unionComplToSubordinate _ _ _ _).trans_le (max_le (hπ₁.3 h) (hc h)), fun _ => ⟨⊥, by simp⟩⟩ #align box_integral.integration_params.mem_base_set.union_compl_to_subordinate BoxIntegral.IntegrationParams.MemBaseSet.unionComplToSubordinate protected theorem MemBaseSet.filter (hπ : l.MemBaseSet I c r π) (p : Box ι → Prop) : l.MemBaseSet I c r (π.filter p) := by refine ⟨fun J hJ => hπ.1 J (π.mem_filter.1 hJ).1, fun hH J hJ => hπ.2 hH J (π.mem_filter.1 hJ).1, fun hD => (distortion_filter_le _ _).trans (hπ.3 hD), fun hD => ?_⟩ rcases hπ.4 hD with ⟨π₁, hπ₁U, hc⟩ set π₂ := π.filter fun J => ¬p J have : Disjoint π₁.iUnion π₂.iUnion := by simpa [π₂, hπ₁U] using disjoint_sdiff_self_left.mono_right sdiff_le refine ⟨π₁.disjUnion π₂.toPrepartition this, ?_, ?_⟩ · suffices ↑I \ π.iUnion ∪ π.iUnion \ (π.filter p).iUnion = ↑I \ (π.filter p).iUnion by simp [π₂, ] have h : (π.filter p).iUnion ⊆ π.iUnion := biUnion_subset_biUnion_left (Finset.filter_subset _ _) ext x fconstructor · rintro (⟨hxI, hxπ⟩ \| ⟨hxπ, hxp⟩) exacts [⟨hxI, mt (@h x) hxπ⟩, ⟨π.iUnion_subset hxπ, hxp⟩] · rintro ⟨hxI, hxp⟩ by_cases hxπ : x ∈ π.iUnion exacts [Or.inr ⟨hxπ, hxp⟩, Or.inl ⟨hxI, hxπ⟩] · have : (π.filter fun J => ¬p J).distortion ≤ c := (distortion_filter_le _ _).trans (hπ.3 hD) simpa [hc] #align box_integral.integration_params.mem_base_set.filter BoxIntegral.IntegrationParams.MemBaseSet.filter theorem biUnionTagged_memBaseSet {π : Prepartition I} {πi : ∀ J, TaggedPrepartition J} (h : ∀ J ∈ π, l.MemBaseSet J c r (πi J)) (hp : ∀ J ∈ π, (πi J).IsPartition) (hc : l.bDistortion → π.compl.distortion ≤ c) : l.MemBaseSet I c r (π.biUnionTagged πi) := by refine ⟨TaggedPrepartition.isSubordinate_biUnionTagged.2 fun J hJ => (h J hJ).1, fun hH => TaggedPrepartition.isHenstock_biUnionTagged.2 fun J hJ => (h J hJ).2 hH, fun hD => ?_, fun hD => ?_⟩ · rw [Prepartition.distortion_biUnionTagged, Finset.sup_le_iff] exact fun J hJ => (h J hJ).3 hD · refine ⟨_, ?_, hc hD⟩ rw [π.iUnion_compl, ← π.iUnion_biUnion_partition hp] rfl #align box_integral.integration_params.bUnion_tagged_mem_base_set BoxIntegral.IntegrationParams.biUnionTagged_memBaseSet @[mono] theorem RCond.mono {ι : Type} {r : (ι → ℝ) → Ioi (0 : ℝ)} (h : l₁ ≤ l₂) (hr : l₂.RCond r) : l₁.RCond r := fun hR => hr (le_iff_imp.1 h.1 hR) #align box_integral.integration_params.r_cond.mono BoxIntegral.IntegrationParams.RCond.mono nonrec theorem RCond.min {ι : Type*} {r₁ r₂ : (ι → ℝ) → Ioi (0 : ℝ)} (h₁ : l.RCond r₁) (h₂ : l.RCond r₂) : l.RCond fun x => min (r₁ x) (r₂ x) := fun hR x => congr_arg₂ min (h₁ hR x) (h₂ hR x) #align box_integral.integration_params.r_cond.min BoxIntegral.IntegrationParams.RCond.min @[mono] theorem toFilterDistortion_mono (I : Box ι) (h : l₁ ≤ l₂) (hc : c₁ ≤ c₂) : l₁.toFilterDistortion I c₁ ≤ l₂.toFilterDistortion I c₂ := iInf_mono fun _ => iInf_mono' fun hr => ⟨hr.mono h, principal_mono.2 fun _ => MemBaseSet.mono I h hc fun _ _ => le_rfl⟩ #align box_integral.integration_params.to_filter_distortion_mono BoxIntegral.IntegrationParams.toFilterDistortion_mono @[mono] theorem toFilter_mono (I : Box ι) {l₁ l₂ : IntegrationParams} (h : l₁ ≤ l₂) : l₁.toFilter I ≤ l₂.toFilter I := iSup_mono fun _ => toFilterDistortion_mono I h le_rfl #align box_integral.integration_params.to_filter_mono BoxIntegral.IntegrationParams.toFilter_mono @[mono] theorem toFilteriUnion_mono (I : Box ι) {l₁ l₂ : IntegrationParams} (h : l₁ ≤ l₂) (π₀ : Prepartition I) : l₁.toFilteriUnion I π₀ ≤ l₂.toFilteriUnion I π₀ := iSup_mono fun _ => inf_le_inf_right _ <\| toFilterDistortion_mono _ h le_rfl #align box_integral.integration_params.to_filter_Union_mono BoxIntegral.IntegrationParams.toFilteriUnion_mono theorem toFilteriUnion_congr (I : Box ι) (l : IntegrationParams) {π₁ π₂ : Prepartition I} (h : π₁.iUnion = π₂.iUnion) : l.toFilteriUnion I π₁ = l.toFilteriUnion I π₂ := by simp only [toFilteriUnion, toFilterDistortioniUnion, h] #align box_integral.integration_params.to_filter_Union_congr BoxIntegral.IntegrationParams.toFilteriUnion_congr theorem hasBasis_toFilterDistortion (l : IntegrationParams) (I : Box ι) (c : ℝ≥0) : (l.toFilterDistortion I c).HasBasis l.RCond fun r => { π \| l.MemBaseSet I c r π } := hasBasis_biInf_principal' (fun _ hr₁ _ hr₂ => ⟨_, hr₁.min hr₂, fun _ => MemBaseSet.mono _ le_rfl le_rfl fun _ _ => min_le_left _ _, fun _ => MemBaseSet.mono _ le_rfl le_rfl fun _ _ => min_le_right _ _⟩) ⟨fun _ => ⟨1, Set.mem_Ioi.2 zero_lt_one⟩, fun _ _ => rfl⟩ #align box_integral.integration_params.has_basis_to_filter_distortion BoxIntegral.IntegrationParams.hasBasis_toFilterDistortion theorem hasBasis_toFilterDistortioniUnion (l : IntegrationParams) (I : Box ι) (c : ℝ≥0) (π₀ : Prepartition I) : (l.toFilterDistortioniUnion I c π₀).HasBasis l.RCond fun r => { π \| l.MemBaseSet I c r π ∧ π.iUnion = π₀.iUnion } := (l.hasBasis_toFilterDistortion I c).inf_principal _ #align box_integral.integration_params.has_basis_to_filter_distortion_Union BoxIntegral.IntegrationParams.hasBasis_toFilterDistortioniUnion	Mathlib/Analysis/BoxIntegral/Partition/Filter.lean	485	489	theorem hasBasis_toFilteriUnion (l : IntegrationParams) (I : Box ι) (π₀ : Prepartition I) : (l.toFilteriUnion I π₀).HasBasis (fun r : ℝ≥0 → (ι → ℝ) → Ioi (0 : ℝ) => ∀ c, l.RCond (r c)) fun r => { π \| ∃ c, l.MemBaseSet I c (r c) π ∧ π.iUnion = π₀.iUnion } := by	have := fun c => l.hasBasis_toFilterDistortioniUnion I c π₀ simpa only [setOf_and, setOf_exists] using hasBasis_iSup this
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]	Mathlib/CategoryTheory/Bicategory/Basic.lean	245	248	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]
import Mathlib.Algebra.Algebra.Operations import Mathlib.Algebra.Algebra.Subalgebra.Prod import Mathlib.Algebra.Algebra.Subalgebra.Tower import Mathlib.LinearAlgebra.Basis import Mathlib.LinearAlgebra.Prod import Mathlib.LinearAlgebra.Finsupp import Mathlib.LinearAlgebra.Prod #align_import ring_theory.adjoin.basic from "leanprover-community/mathlib"@"a35ddf20601f85f78cd57e7f5b09ed528d71b7af" universe uR uS uA uB open Pointwise open Submodule Subsemiring variable {R : Type uR} {S : Type uS} {A : Type uA} {B : Type uB} namespace Algebra section Semiring variable [CommSemiring R] [CommSemiring S] [Semiring A] [Semiring B] variable [Algebra R S] [Algebra R A] [Algebra S A] [Algebra R B] [IsScalarTower R S A] variable {s t : Set A} @[aesop safe 20 apply (rule_sets := [SetLike])] theorem subset_adjoin : s ⊆ adjoin R s := Algebra.gc.le_u_l s #align algebra.subset_adjoin Algebra.subset_adjoin theorem adjoin_le {S : Subalgebra R A} (H : s ⊆ S) : adjoin R s ≤ S := Algebra.gc.l_le H #align algebra.adjoin_le Algebra.adjoin_le theorem adjoin_eq_sInf : adjoin R s = sInf { p : Subalgebra R A \| s ⊆ p } := le_antisymm (le_sInf fun _ h => adjoin_le h) (sInf_le subset_adjoin) #align algebra.adjoin_eq_Inf Algebra.adjoin_eq_sInf theorem adjoin_le_iff {S : Subalgebra R A} : adjoin R s ≤ S ↔ s ⊆ S := Algebra.gc _ _ #align algebra.adjoin_le_iff Algebra.adjoin_le_iff theorem adjoin_mono (H : s ⊆ t) : adjoin R s ≤ adjoin R t := Algebra.gc.monotone_l H #align algebra.adjoin_mono Algebra.adjoin_mono theorem adjoin_eq_of_le (S : Subalgebra R A) (h₁ : s ⊆ S) (h₂ : S ≤ adjoin R s) : adjoin R s = S := le_antisymm (adjoin_le h₁) h₂ #align algebra.adjoin_eq_of_le Algebra.adjoin_eq_of_le theorem adjoin_eq (S : Subalgebra R A) : adjoin R ↑S = S := adjoin_eq_of_le _ (Set.Subset.refl _) subset_adjoin #align algebra.adjoin_eq Algebra.adjoin_eq theorem adjoin_iUnion {α : Type} (s : α → Set A) : adjoin R (Set.iUnion s) = ⨆ i : α, adjoin R (s i) := (@Algebra.gc R A _ _ _).l_iSup #align algebra.adjoin_Union Algebra.adjoin_iUnion theorem adjoin_attach_biUnion [DecidableEq A] {α : Type} {s : Finset α} (f : s → Finset A) : adjoin R (s.attach.biUnion f : Set A) = ⨆ x, adjoin R (f x) := by simp [adjoin_iUnion] #align algebra.adjoin_attach_bUnion Algebra.adjoin_attach_biUnion @[elab_as_elim] theorem adjoin_induction {p : A → Prop} {x : A} (h : x ∈ adjoin R s) (mem : ∀ x ∈ s, p x) (algebraMap : ∀ r, p (algebraMap R A r)) (add : ∀ x y, p x → p y → p (x + y)) (mul : ∀ x y, p x → p y → p (x * y)) : p x := let S : Subalgebra R A := { carrier := p mul_mem' := mul _ _ add_mem' := add _ _ algebraMap_mem' := algebraMap } adjoin_le (show s ≤ S from mem) h #align algebra.adjoin_induction Algebra.adjoin_induction @[elab_as_elim] theorem adjoin_induction₂ {p : A → A → Prop} {a b : A} (ha : a ∈ adjoin R s) (hb : b ∈ adjoin R s) (Hs : ∀ x ∈ s, ∀ y ∈ s, p x y) (Halg : ∀ r₁ r₂, p (algebraMap R A r₁) (algebraMap R A r₂)) (Halg_left : ∀ (r), ∀ x ∈ s, p (algebraMap R A r) x) (Halg_right : ∀ (r), ∀ x ∈ s, p x (algebraMap R A r)) (Hadd_left : ∀ x₁ x₂ y, p x₁ y → p x₂ y → p (x₁ + x₂) y) (Hadd_right : ∀ x y₁ y₂, p x y₁ → p x y₂ → p x (y₁ + y₂)) (Hmul_left : ∀ x₁ x₂ y, p x₁ y → p x₂ y → p (x₁ * x₂) y) (Hmul_right : ∀ x y₁ y₂, p x y₁ → p x y₂ → p x (y₁ * y₂)) : p a b := by refine adjoin_induction hb ?_ (fun r => ?_) (Hadd_right a) (Hmul_right a) · exact adjoin_induction ha Hs Halg_left (fun x y Hx Hy z hz => Hadd_left x y z (Hx z hz) (Hy z hz)) fun x y Hx Hy z hz => Hmul_left x y z (Hx z hz) (Hy z hz) · exact adjoin_induction ha (Halg_right r) (fun r' => Halg r' r) (fun x y => Hadd_left x y ((algebraMap R A) r)) fun x y => Hmul_left x y ((algebraMap R A) r) #align algebra.adjoin_induction₂ Algebra.adjoin_induction₂ @[elab_as_elim] theorem adjoin_induction' {p : adjoin R s → Prop} (mem : ∀ (x) (h : x ∈ s), p ⟨x, subset_adjoin h⟩) (algebraMap : ∀ r, p (algebraMap R _ r)) (add : ∀ x y, p x → p y → p (x + y)) (mul : ∀ x y, p x → p y → p (x * y)) (x : adjoin R s) : p x := Subtype.recOn x fun x hx => by refine Exists.elim ?_ fun (hx : x ∈ adjoin R s) (hc : p ⟨x, hx⟩) => hc exact adjoin_induction hx (fun x hx => ⟨subset_adjoin hx, mem x hx⟩) (fun r => ⟨Subalgebra.algebraMap_mem _ r, algebraMap r⟩) (fun x y hx hy => Exists.elim hx fun hx' hx => Exists.elim hy fun hy' hy => ⟨Subalgebra.add_mem _ hx' hy', add _ _ hx hy⟩) fun x y hx hy => Exists.elim hx fun hx' hx => Exists.elim hy fun hy' hy => ⟨Subalgebra.mul_mem _ hx' hy', mul _ _ hx hy⟩ #align algebra.adjoin_induction' Algebra.adjoin_induction' @[elab_as_elim] theorem adjoin_induction'' {x : A} (hx : x ∈ adjoin R s) {p : (x : A) → x ∈ adjoin R s → Prop} (mem : ∀ x (h : x ∈ s), p x (subset_adjoin h)) (algebraMap : ∀ (r : R), p (algebraMap R A r) (algebraMap_mem _ r)) (add : ∀ x hx y hy, p x hx → p y hy → p (x + y) (add_mem hx hy)) (mul : ∀ x hx y hy, p x hx → p y hy → p (x * y) (mul_mem hx hy)) : p x hx := by refine adjoin_induction' mem algebraMap ?_ ?_ ⟨x, hx⟩ (p := fun x : adjoin R s ↦ p x.1 x.2) exacts [fun x y ↦ add x.1 x.2 y.1 y.2, fun x y ↦ mul x.1 x.2 y.1 y.2] @[simp] theorem adjoin_adjoin_coe_preimage {s : Set A} : adjoin R (((↑) : adjoin R s → A) ⁻¹' s) = ⊤ := by refine eq_top_iff.2 fun x ↦ adjoin_induction' (fun a ha ↦ ?_) (fun r ↦ ?_) (fun _ _ ↦ ?_) (fun _ _ ↦ ?_) x · exact subset_adjoin ha · exact Subalgebra.algebraMap_mem _ r · exact Subalgebra.add_mem _ · exact Subalgebra.mul_mem _ #align algebra.adjoin_adjoin_coe_preimage Algebra.adjoin_adjoin_coe_preimage theorem adjoin_union (s t : Set A) : adjoin R (s ∪ t) = adjoin R s ⊔ adjoin R t := (Algebra.gc : GaloisConnection _ ((↑) : Subalgebra R A → Set A)).l_sup #align algebra.adjoin_union Algebra.adjoin_union variable (R A) @[simp] theorem adjoin_empty : adjoin R (∅ : Set A) = ⊥ := show adjoin R ⊥ = ⊥ by apply GaloisConnection.l_bot exact Algebra.gc #align algebra.adjoin_empty Algebra.adjoin_empty @[simp] theorem adjoin_univ : adjoin R (Set.univ : Set A) = ⊤ := eq_top_iff.2 fun _x => subset_adjoin <\| Set.mem_univ _ #align algebra.adjoin_univ Algebra.adjoin_univ variable {A} (s) theorem adjoin_eq_span : Subalgebra.toSubmodule (adjoin R s) = span R (Submonoid.closure s) := by apply le_antisymm · intro r hr rcases Subsemiring.mem_closure_iff_exists_list.1 hr with ⟨L, HL, rfl⟩ clear hr induction' L with hd tl ih · exact zero_mem _ rw [List.forall_mem_cons] at HL rw [List.map_cons, List.sum_cons] refine Submodule.add_mem _ ?_ (ih HL.2) replace HL := HL.1 clear ih tl suffices ∃ (z r : _) (_hr : r ∈ Submonoid.closure s), z • r = List.prod hd by rcases this with ⟨z, r, hr, hzr⟩ rw [← hzr] exact smul_mem _ _ (subset_span hr) induction' hd with hd tl ih · exact ⟨1, 1, (Submonoid.closure s).one_mem', one_smul _ _⟩ rw [List.forall_mem_cons] at HL rcases ih HL.2 with ⟨z, r, hr, hzr⟩ rw [List.prod_cons, ← hzr] rcases HL.1 with (⟨hd, rfl⟩ \| hs) · refine ⟨hd * z, r, hr, ?_⟩ rw [Algebra.smul_def, Algebra.smul_def, (algebraMap _ _).map_mul, _root_.mul_assoc] · exact ⟨z, hd * r, Submonoid.mul_mem _ (Submonoid.subset_closure hs) hr, (mul_smul_comm _ _ _).symm⟩ refine span_le.2 ?_ change Submonoid.closure s ≤ (adjoin R s).toSubsemiring.toSubmonoid exact Submonoid.closure_le.2 subset_adjoin #align algebra.adjoin_eq_span Algebra.adjoin_eq_span theorem span_le_adjoin (s : Set A) : span R s ≤ Subalgebra.toSubmodule (adjoin R s) := span_le.mpr subset_adjoin #align algebra.span_le_adjoin Algebra.span_le_adjoin theorem adjoin_toSubmodule_le {s : Set A} {t : Submodule R A} : Subalgebra.toSubmodule (adjoin R s) ≤ t ↔ ↑(Submonoid.closure s) ⊆ (t : Set A) := by rw [adjoin_eq_span, span_le] #align algebra.adjoin_to_submodule_le Algebra.adjoin_toSubmodule_le theorem adjoin_eq_span_of_subset {s : Set A} (hs : ↑(Submonoid.closure s) ⊆ (span R s : Set A)) : Subalgebra.toSubmodule (adjoin R s) = span R s := le_antisymm ((adjoin_toSubmodule_le R).mpr hs) (span_le_adjoin R s) #align algebra.adjoin_eq_span_of_subset Algebra.adjoin_eq_span_of_subset @[simp] theorem adjoin_span {s : Set A} : adjoin R (Submodule.span R s : Set A) = adjoin R s := le_antisymm (adjoin_le (span_le_adjoin _ _)) (adjoin_mono Submodule.subset_span) #align algebra.adjoin_span Algebra.adjoin_span theorem adjoin_image (f : A →ₐ[R] B) (s : Set A) : adjoin R (f '' s) = (adjoin R s).map f := le_antisymm (adjoin_le <\| Set.image_subset _ subset_adjoin) <\| Subalgebra.map_le.2 <\| adjoin_le <\| Set.image_subset_iff.1 <\| by -- Porting note: I don't understand how this worked in Lean 3 with just `subset_adjoin` simp only [Set.image_id', coe_carrier_toSubmonoid, Subalgebra.coe_toSubsemiring, Subalgebra.coe_comap] exact fun x hx => subset_adjoin ⟨x, hx, rfl⟩ #align algebra.adjoin_image Algebra.adjoin_image @[simp] theorem adjoin_insert_adjoin (x : A) : adjoin R (insert x ↑(adjoin R s)) = adjoin R (insert x s) := le_antisymm (adjoin_le (Set.insert_subset_iff.mpr ⟨subset_adjoin (Set.mem_insert _ _), adjoin_mono (Set.subset_insert _ _)⟩)) (Algebra.adjoin_mono (Set.insert_subset_insert Algebra.subset_adjoin)) #align algebra.adjoin_insert_adjoin Algebra.adjoin_insert_adjoin theorem adjoin_prod_le (s : Set A) (t : Set B) : adjoin R (s ×ˢ t) ≤ (adjoin R s).prod (adjoin R t) := adjoin_le <\| Set.prod_mono subset_adjoin subset_adjoin #align algebra.adjoin_prod_le Algebra.adjoin_prod_le theorem mem_adjoin_of_map_mul {s} {x : A} {f : A →ₗ[R] B} (hf : ∀ a₁ a₂, f (a₁ * a₂) = f a₁ * f a₂) (h : x ∈ adjoin R s) : f x ∈ adjoin R (f '' (s ∪ {1})) := by refine @adjoin_induction R A _ _ _ _ (fun a => f a ∈ adjoin R (f '' (s ∪ {1}))) x h (fun a ha => subset_adjoin ⟨a, ⟨Set.subset_union_left ha, rfl⟩⟩) (fun r => ?_) (fun y z hy hz => by simpa [hy, hz] using Subalgebra.add_mem _ hy hz) fun y z hy hz => by simpa [hy, hz, hf y z] using Subalgebra.mul_mem _ hy hz have : f 1 ∈ adjoin R (f '' (s ∪ {1})) := subset_adjoin ⟨1, ⟨Set.subset_union_right <\| Set.mem_singleton 1, rfl⟩⟩ convert Subalgebra.smul_mem (adjoin R (f '' (s ∪ {1}))) this r rw [algebraMap_eq_smul_one] exact f.map_smul _ _ #align algebra.mem_adjoin_of_map_mul Algebra.mem_adjoin_of_map_mul	Mathlib/RingTheory/Adjoin/Basic.lean	261	279	theorem adjoin_inl_union_inr_eq_prod (s) (t) : adjoin R (LinearMap.inl R A B '' (s ∪ {1}) ∪ LinearMap.inr R A B '' (t ∪ {1})) = (adjoin R s).prod (adjoin R t) := by	apply le_antisymm · simp only [adjoin_le_iff, Set.insert_subset_iff, Subalgebra.zero_mem, Subalgebra.one_mem, subset_adjoin,-- the rest comes from `squeeze_simp` Set.union_subset_iff, LinearMap.coe_inl, Set.mk_preimage_prod_right, Set.image_subset_iff, SetLike.mem_coe, Set.mk_preimage_prod_left, LinearMap.coe_inr, and_self_iff, Set.union_singleton, Subalgebra.coe_prod] · rintro ⟨a, b⟩ ⟨ha, hb⟩ let P := adjoin R (LinearMap.inl R A B '' (s ∪ {1}) ∪ LinearMap.inr R A B '' (t ∪ {1})) have Ha : (a, (0 : B)) ∈ adjoin R (LinearMap.inl R A B '' (s ∪ {1})) := mem_adjoin_of_map_mul R LinearMap.inl_map_mul ha have Hb : ((0 : A), b) ∈ adjoin R (LinearMap.inr R A B '' (t ∪ {1})) := mem_adjoin_of_map_mul R LinearMap.inr_map_mul hb replace Ha : (a, (0 : B)) ∈ P := adjoin_mono Set.subset_union_left Ha replace Hb : ((0 : A), b) ∈ P := adjoin_mono Set.subset_union_right Hb simpa [P] using Subalgebra.add_mem _ Ha Hb
import Mathlib.SetTheory.Ordinal.Arithmetic import Mathlib.SetTheory.Ordinal.Exponential #align_import set_theory.ordinal.cantor_normal_form from "leanprover-community/mathlib"@"991ff3b5269848f6dd942ae8e9dd3c946035dc8b" noncomputable section universe u open List namespace Ordinal @[elab_as_elim] noncomputable def CNFRec (b : Ordinal) {C : Ordinal → Sort} (H0 : C 0) (H : ∀ o, o ≠ 0 → C (o % b ^ log b o) → C o) : ∀ o, C o := fun o ↦ by by_cases h : o = 0 · rw [h]; exact H0 · exact H o h (CNFRec _ H0 H (o % b ^ log b o)) termination_by o => o decreasing_by exact mod_opow_log_lt_self b h set_option linter.uppercaseLean3 false in #align ordinal.CNF_rec Ordinal.CNFRec @[simp] theorem CNFRec_zero {C : Ordinal → Sort} (b : Ordinal) (H0 : C 0) (H : ∀ o, o ≠ 0 → C (o % b ^ log b o) → C o) : @CNFRec b C H0 H 0 = H0 := by rw [CNFRec, dif_pos rfl] rfl set_option linter.uppercaseLean3 false in #align ordinal.CNF_rec_zero Ordinal.CNFRec_zero theorem CNFRec_pos (b : Ordinal) {o : Ordinal} {C : Ordinal → Sort} (ho : o ≠ 0) (H0 : C 0) (H : ∀ o, o ≠ 0 → C (o % b ^ log b o) → C o) : @CNFRec b C H0 H o = H o ho (@CNFRec b C H0 H _) := by rw [CNFRec, dif_neg ho] set_option linter.uppercaseLean3 false in #align ordinal.CNF_rec_pos Ordinal.CNFRec_pos -- Porting note: unknown attribute @[pp_nodot] def CNF (b o : Ordinal) : List (Ordinal × Ordinal) := CNFRec b [] (fun o _ho IH ↦ (log b o, o / b ^ log b o)::IH) o set_option linter.uppercaseLean3 false in #align ordinal.CNF Ordinal.CNF @[simp] theorem CNF_zero (b : Ordinal) : CNF b 0 = [] := CNFRec_zero b _ _ set_option linter.uppercaseLean3 false in #align ordinal.CNF_zero Ordinal.CNF_zero theorem CNF_ne_zero {b o : Ordinal} (ho : o ≠ 0) : CNF b o = (log b o, o / b ^ log b o)::CNF b (o % b ^ log b o) := CNFRec_pos b ho _ _ set_option linter.uppercaseLean3 false in #align ordinal.CNF_ne_zero Ordinal.CNF_ne_zero theorem zero_CNF {o : Ordinal} (ho : o ≠ 0) : CNF 0 o = [⟨0, o⟩] := by simp [CNF_ne_zero ho] set_option linter.uppercaseLean3 false in #align ordinal.zero_CNF Ordinal.zero_CNF theorem one_CNF {o : Ordinal} (ho : o ≠ 0) : CNF 1 o = [⟨0, o⟩] := by simp [CNF_ne_zero ho] set_option linter.uppercaseLean3 false in #align ordinal.one_CNF Ordinal.one_CNF theorem CNF_of_le_one {b o : Ordinal} (hb : b ≤ 1) (ho : o ≠ 0) : CNF b o = [⟨0, o⟩] := by rcases le_one_iff.1 hb with (rfl \| rfl) · exact zero_CNF ho · exact one_CNF ho set_option linter.uppercaseLean3 false in #align ordinal.CNF_of_le_one Ordinal.CNF_of_le_one theorem CNF_of_lt {b o : Ordinal} (ho : o ≠ 0) (hb : o < b) : CNF b o = [⟨0, o⟩] := by simp only [CNF_ne_zero ho, log_eq_zero hb, opow_zero, div_one, mod_one, CNF_zero] set_option linter.uppercaseLean3 false in #align ordinal.CNF_of_lt Ordinal.CNF_of_lt theorem CNF_foldr (b o : Ordinal) : (CNF b o).foldr (fun p r ↦ b ^ p.1 p.2 + r) 0 = o := CNFRec b (by rw [CNF_zero]; rfl) (fun o ho IH ↦ by rw [CNF_ne_zero ho, foldr_cons, IH, div_add_mod]) o set_option linter.uppercaseLean3 false in #align ordinal.CNF_foldr Ordinal.CNF_foldr theorem CNF_fst_le_log {b o : Ordinal.{u}} {x : Ordinal × Ordinal} : x ∈ CNF b o → x.1 ≤ log b o := by refine CNFRec b ?_ (fun o ho H ↦ ?_) o · rw [CNF_zero] intro contra; contradiction · rw [CNF_ne_zero ho, mem_cons] rintro (rfl \| h) · exact le_rfl · exact (H h).trans (log_mono_right _ (mod_opow_log_lt_self b ho).le) set_option linter.uppercaseLean3 false in #align ordinal.CNF_fst_le_log Ordinal.CNF_fst_le_log theorem CNF_fst_le {b o : Ordinal.{u}} {x : Ordinal × Ordinal} (h : x ∈ CNF b o) : x.1 ≤ o := (CNF_fst_le_log h).trans <\| log_le_self _ _ set_option linter.uppercaseLean3 false in #align ordinal.CNF_fst_le Ordinal.CNF_fst_le theorem CNF_lt_snd {b o : Ordinal.{u}} {x : Ordinal × Ordinal} : x ∈ CNF b o → 0 < x.2 := by refine CNFRec b (by simp) (fun o ho IH ↦ ?_) o rw [CNF_ne_zero ho] rintro (h \| ⟨_, h⟩) · exact div_opow_log_pos b ho · exact IH h set_option linter.uppercaseLean3 false in #align ordinal.CNF_lt_snd Ordinal.CNF_lt_snd theorem CNF_snd_lt {b o : Ordinal.{u}} (hb : 1 < b) {x : Ordinal × Ordinal} : x ∈ CNF b o → x.2 < b := by refine CNFRec b ?_ (fun o ho IH ↦ ?_) o · simp only [CNF_zero, not_mem_nil, IsEmpty.forall_iff] · rw [CNF_ne_zero ho] intro h cases' (mem_cons.mp h) with h h · rw [h]; simpa only using div_opow_log_lt o hb · exact IH h set_option linter.uppercaseLean3 false in #align ordinal.CNF_snd_lt Ordinal.CNF_snd_lt	Mathlib/SetTheory/Ordinal/CantorNormalForm.lean	163	174	theorem CNF_sorted (b o : Ordinal) : ((CNF b o).map Prod.fst).Sorted (· > ·) := by	refine CNFRec b ?_ (fun o ho IH ↦ ?_) o · simp only [gt_iff_lt, CNF_zero, map_nil, sorted_nil] · rcases le_or_lt b 1 with hb \| hb · simp only [CNF_of_le_one hb ho, gt_iff_lt, map_cons, map, sorted_singleton] · cases' lt_or_le o b with hob hbo · simp only [CNF_of_lt ho hob, gt_iff_lt, map_cons, map, sorted_singleton] · rw [CNF_ne_zero ho, map_cons, sorted_cons] refine ⟨fun a H ↦ ?_, IH⟩ rw [mem_map] at H rcases H with ⟨⟨a, a'⟩, H, rfl⟩ exact (CNF_fst_le_log H).trans_lt (log_mod_opow_log_lt_log_self hb ho hbo)
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	Mathlib/Analysis/SpecialFunctions/Complex/Arg.lean	190	194	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]
import Mathlib.Analysis.Fourier.AddCircle import Mathlib.Analysis.Fourier.FourierTransform import Mathlib.Analysis.PSeries import Mathlib.Analysis.Distribution.SchwartzSpace import Mathlib.MeasureTheory.Measure.Lebesgue.Integral #align_import analysis.fourier.poisson_summation from "leanprover-community/mathlib"@"fd5edc43dc4f10b85abfe544b88f82cf13c5f844" noncomputable section open Function hiding comp_apply open Set hiding restrict_apply open Complex hiding abs_of_nonneg open Real open TopologicalSpace Filter MeasureTheory Asymptotics open scoped Real Filter FourierTransform open ContinuousMap theorem Real.fourierCoeff_tsum_comp_add {f : C(ℝ, ℂ)} (hf : ∀ K : Compacts ℝ, Summable fun n : ℤ => ‖(f.comp (ContinuousMap.addRight n)).restrict K‖) (m : ℤ) : fourierCoeff (Periodic.lift <\| f.periodic_tsum_comp_add_zsmul 1) m = 𝓕 f m := by -- NB: This proof can be shortened somewhat by telescoping together some of the steps in the calc -- block, but I think it's more legible this way. We start with preliminaries about the integrand. let e : C(ℝ, ℂ) := (fourier (-m)).comp ⟨((↑) : ℝ → UnitAddCircle), continuous_quotient_mk'⟩ have neK : ∀ (K : Compacts ℝ) (g : C(ℝ, ℂ)), ‖(e * g).restrict K‖ = ‖g.restrict K‖ := by have (x : ℝ) : ‖e x‖ = 1 := abs_coe_circle (AddCircle.toCircle (-m • x)) intro K g simp_rw [norm_eq_iSup_norm, restrict_apply, mul_apply, norm_mul, this, one_mul] have eadd : ∀ (n : ℤ), e.comp (ContinuousMap.addRight n) = e := by intro n; ext1 x have : Periodic e 1 := Periodic.comp (fun x => AddCircle.coe_add_period 1 x) (fourier (-m)) simpa only [mul_one] using this.int_mul n x -- Now the main argument. First unwind some definitions. calc fourierCoeff (Periodic.lift <\| f.periodic_tsum_comp_add_zsmul 1) m = ∫ x in (0 : ℝ)..1, e x * (∑' n : ℤ, f.comp (ContinuousMap.addRight n)) x := by simp_rw [fourierCoeff_eq_intervalIntegral _ m 0, div_one, one_smul, zero_add, e, comp_apply, coe_mk, Periodic.lift_coe, zsmul_one, smul_eq_mul] -- Transform sum in C(ℝ, ℂ) evaluated at x into pointwise sum of values. _ = ∫ x in (0:ℝ)..1, ∑' n : ℤ, (e * f.comp (ContinuousMap.addRight n)) x := by simp_rw [coe_mul, Pi.mul_apply, ← ContinuousMap.tsum_apply (summable_of_locally_summable_norm hf), tsum_mul_left] -- Swap sum and integral. _ = ∑' n : ℤ, ∫ x in (0:ℝ)..1, (e * f.comp (ContinuousMap.addRight n)) x := by refine (intervalIntegral.tsum_intervalIntegral_eq_of_summable_norm ?_).symm convert hf ⟨uIcc 0 1, isCompact_uIcc⟩ using 1 exact funext fun n => neK _ _ _ = ∑' n : ℤ, ∫ x in (0:ℝ)..1, (e * f).comp (ContinuousMap.addRight n) x := by simp only [ContinuousMap.comp_apply, mul_comp] at eadd ⊢ simp_rw [eadd] -- Rearrange sum of interval integrals into an integral over `ℝ`. _ = ∫ x, e x * f x := by suffices Integrable (e * f) from this.hasSum_intervalIntegral_comp_add_int.tsum_eq apply integrable_of_summable_norm_Icc convert hf ⟨Icc 0 1, isCompact_Icc⟩ using 1 simp_rw [mul_comp] at eadd ⊢ simp_rw [eadd] exact funext fun n => neK ⟨Icc 0 1, isCompact_Icc⟩ _ -- Minor tidying to finish _ = 𝓕 f m := by rw [fourierIntegral_real_eq_integral_exp_smul] congr 1 with x : 1 rw [smul_eq_mul, comp_apply, coe_mk, coe_mk, ContinuousMap.toFun_eq_coe, fourier_coe_apply] congr 2 push_cast ring #align real.fourier_coeff_tsum_comp_add Real.fourierCoeff_tsum_comp_add	Mathlib/Analysis/Fourier/PoissonSummation.lean	107	121	theorem Real.tsum_eq_tsum_fourierIntegral {f : C(ℝ, ℂ)} (h_norm : ∀ K : Compacts ℝ, Summable fun n : ℤ => ‖(f.comp <\| ContinuousMap.addRight n).restrict K‖) (h_sum : Summable fun n : ℤ => 𝓕 f n) (x : ℝ) : ∑' n : ℤ, f (x + n) = ∑' n : ℤ, 𝓕 f n * fourier n (x : UnitAddCircle) := by	let F : C(UnitAddCircle, ℂ) := ⟨(f.periodic_tsum_comp_add_zsmul 1).lift, continuous_coinduced_dom.mpr (map_continuous _)⟩ have : Summable (fourierCoeff F) := by convert h_sum exact Real.fourierCoeff_tsum_comp_add h_norm _ convert (has_pointwise_sum_fourier_series_of_summable this x).tsum_eq.symm using 1 · simpa only [F, coe_mk, ← QuotientAddGroup.mk_zero, Periodic.lift_coe, zsmul_one, comp_apply, coe_addRight, zero_add] using (hasSum_apply (summable_of_locally_summable_norm h_norm).hasSum x).tsum_eq · simp_rw [← Real.fourierCoeff_tsum_comp_add h_norm, smul_eq_mul, F, coe_mk]
import Mathlib.Topology.Sheaves.Forget import Mathlib.Topology.Sheaves.SheafCondition.PairwiseIntersections import Mathlib.CategoryTheory.Limits.Shapes.Types #align_import topology.sheaves.sheaf_condition.unique_gluing from "leanprover-community/mathlib"@"5dc6092d09e5e489106865241986f7f2ad28d4c8" noncomputable section open TopCat TopCat.Presheaf CategoryTheory CategoryTheory.Limits TopologicalSpace TopologicalSpace.Opens Opposite universe v u x variable {C : Type u} [Category.{v} C] [ConcreteCategory.{v} C] namespace TopCat namespace Presheaf section attribute [local instance] ConcreteCategory.hasCoeToSort ConcreteCategory.instFunLike variable {X : TopCat.{x}} (F : Presheaf C X) {ι : Type x} (U : ι → Opens X) def IsCompatible (sf : ∀ i : ι, F.obj (op (U i))) : Prop := ∀ i j : ι, F.map (infLELeft (U i) (U j)).op (sf i) = F.map (infLERight (U i) (U j)).op (sf j) set_option linter.uppercaseLean3 false in #align Top.presheaf.is_compatible TopCat.Presheaf.IsCompatible def IsGluing (sf : ∀ i : ι, F.obj (op (U i))) (s : F.obj (op (iSup U))) : Prop := ∀ i : ι, F.map (Opens.leSupr U i).op s = sf i set_option linter.uppercaseLean3 false in #align Top.presheaf.is_gluing TopCat.Presheaf.IsGluing def IsSheafUniqueGluing : Prop := ∀ ⦃ι : Type x⦄ (U : ι → Opens X) (sf : ∀ i : ι, F.obj (op (U i))), IsCompatible F U sf → ∃! s : F.obj (op (iSup U)), IsGluing F U sf s set_option linter.uppercaseLean3 false in #align Top.presheaf.is_sheaf_unique_gluing TopCat.Presheaf.IsSheafUniqueGluing end section TypeValued variable {X : TopCat.{x}} {F : Presheaf (Type u) X} {ι : Type x} {U : ι → Opens X} def objPairwiseOfFamily (sf : ∀ i, F.obj (op (U i))) : ∀ i, ((Pairwise.diagram U).op ⋙ F).obj i \| ⟨Pairwise.single i⟩ => sf i \| ⟨Pairwise.pair i j⟩ => F.map (infLELeft (U i) (U j)).op (sf i) def IsCompatible.sectionPairwise {sf} (h : IsCompatible F U sf) : ((Pairwise.diagram U).op ⋙ F).sections := by refine ⟨objPairwiseOfFamily sf, ?_⟩ let G := (Pairwise.diagram U).op ⋙ F rintro (i\|⟨i,j⟩) (i'\|⟨i',j'⟩) (_\|_\|_\|_) · exact congr_fun (G.map_id <\| op <\| Pairwise.single i) _ · rfl · exact (h i' i).symm · exact congr_fun (G.map_id <\| op <\| Pairwise.pair i j) _	Mathlib/Topology/Sheaves/SheafCondition/UniqueGluing.lean	112	118	theorem isGluing_iff_pairwise {sf s} : IsGluing F U sf s ↔ ∀ i, (F.mapCone (Pairwise.cocone U).op).π.app i s = objPairwiseOfFamily sf i := by	refine ⟨fun h ↦ ?_, fun h i ↦ h (op <\| Pairwise.single i)⟩ rintro (i\|⟨i,j⟩) · exact h i · rw [← (F.mapCone (Pairwise.cocone U).op).w (op <\| Pairwise.Hom.left i j)] exact congr_arg _ (h i)
import Mathlib.Algebra.Ring.Prod import Mathlib.GroupTheory.OrderOfElement import Mathlib.Tactic.FinCases #align_import data.zmod.basic from "leanprover-community/mathlib"@"74ad1c88c77e799d2fea62801d1dbbd698cff1b7" assert_not_exists Submodule open Function namespace ZMod instance charZero : CharZero (ZMod 0) := inferInstanceAs (CharZero ℤ) def val : ∀ {n : ℕ}, ZMod n → ℕ \| 0 => Int.natAbs \| n + 1 => ((↑) : Fin (n + 1) → ℕ) #align zmod.val ZMod.val theorem val_lt {n : ℕ} [NeZero n] (a : ZMod n) : a.val < n := by cases n · cases NeZero.ne 0 rfl exact Fin.is_lt a #align zmod.val_lt ZMod.val_lt theorem val_le {n : ℕ} [NeZero n] (a : ZMod n) : a.val ≤ n := a.val_lt.le #align zmod.val_le ZMod.val_le @[simp] theorem val_zero : ∀ {n}, (0 : ZMod n).val = 0 \| 0 => rfl \| _ + 1 => rfl #align zmod.val_zero ZMod.val_zero @[simp] theorem val_one' : (1 : ZMod 0).val = 1 := rfl #align zmod.val_one' ZMod.val_one' @[simp] theorem val_neg' {n : ZMod 0} : (-n).val = n.val := Int.natAbs_neg n #align zmod.val_neg' ZMod.val_neg' @[simp] theorem val_mul' {m n : ZMod 0} : (m * n).val = m.val * n.val := Int.natAbs_mul m n #align zmod.val_mul' ZMod.val_mul' @[simp] theorem val_natCast {n : ℕ} (a : ℕ) : (a : ZMod n).val = a % n := by cases n · rw [Nat.mod_zero] exact Int.natAbs_ofNat a · apply Fin.val_natCast #align zmod.val_nat_cast ZMod.val_natCast @[deprecated (since := "2024-04-17")] alias val_nat_cast := val_natCast theorem val_unit' {n : ZMod 0} : IsUnit n ↔ n.val = 1 := by simp only [val] rw [Int.isUnit_iff, Int.natAbs_eq_iff, Nat.cast_one] lemma eq_one_of_isUnit_natCast {n : ℕ} (h : IsUnit (n : ZMod 0)) : n = 1 := by rw [← Nat.mod_zero n, ← val_natCast, val_unit'.mp h] theorem val_natCast_of_lt {n a : ℕ} (h : a < n) : (a : ZMod n).val = a := by rwa [val_natCast, Nat.mod_eq_of_lt] @[deprecated (since := "2024-04-17")] alias val_nat_cast_of_lt := val_natCast_of_lt instance charP (n : ℕ) : CharP (ZMod n) n where cast_eq_zero_iff' := by intro k cases' n with n · simp [zero_dvd_iff, Int.natCast_eq_zero, Nat.zero_eq] · exact Fin.natCast_eq_zero @[simp] theorem addOrderOf_one (n : ℕ) : addOrderOf (1 : ZMod n) = n := CharP.eq _ (CharP.addOrderOf_one _) (ZMod.charP n) #align zmod.add_order_of_one ZMod.addOrderOf_one @[simp] theorem addOrderOf_coe (a : ℕ) {n : ℕ} (n0 : n ≠ 0) : addOrderOf (a : ZMod n) = n / n.gcd a := by cases' a with a · simp only [Nat.zero_eq, Nat.cast_zero, addOrderOf_zero, Nat.gcd_zero_right, Nat.pos_of_ne_zero n0, Nat.div_self] rw [← Nat.smul_one_eq_cast, addOrderOf_nsmul' _ a.succ_ne_zero, ZMod.addOrderOf_one] #align zmod.add_order_of_coe ZMod.addOrderOf_coe @[simp] theorem addOrderOf_coe' {a : ℕ} (n : ℕ) (a0 : a ≠ 0) : addOrderOf (a : ZMod n) = n / n.gcd a := by rw [← Nat.smul_one_eq_cast, addOrderOf_nsmul' _ a0, ZMod.addOrderOf_one] #align zmod.add_order_of_coe' ZMod.addOrderOf_coe' theorem ringChar_zmod_n (n : ℕ) : ringChar (ZMod n) = n := by rw [ringChar.eq_iff] exact ZMod.charP n #align zmod.ring_char_zmod_n ZMod.ringChar_zmod_n -- @[simp] -- Porting note (#10618): simp can prove this theorem natCast_self (n : ℕ) : (n : ZMod n) = 0 := CharP.cast_eq_zero (ZMod n) n #align zmod.nat_cast_self ZMod.natCast_self @[deprecated (since := "2024-04-17")] alias nat_cast_self := natCast_self @[simp] theorem natCast_self' (n : ℕ) : (n + 1 : ZMod (n + 1)) = 0 := by rw [← Nat.cast_add_one, natCast_self (n + 1)] #align zmod.nat_cast_self' ZMod.natCast_self' @[deprecated (since := "2024-04-17")] alias nat_cast_self' := natCast_self' section UniversalProperty variable {n : ℕ} {R : Type} section variable [AddGroupWithOne R] def cast : ∀ {n : ℕ}, ZMod n → R \| 0 => Int.cast \| _ + 1 => fun i => i.val #align zmod.cast ZMod.cast @[simp] theorem cast_zero : (cast (0 : ZMod n) : R) = 0 := by delta ZMod.cast cases n · exact Int.cast_zero · simp #align zmod.cast_zero ZMod.cast_zero theorem cast_eq_val [NeZero n] (a : ZMod n) : (cast a : R) = a.val := by cases n · cases NeZero.ne 0 rfl rfl #align zmod.cast_eq_val ZMod.cast_eq_val variable {S : Type} [AddGroupWithOne S] @[simp] theorem _root_.Prod.fst_zmod_cast (a : ZMod n) : (cast a : R × S).fst = cast a := by cases n · rfl · simp [ZMod.cast] #align prod.fst_zmod_cast Prod.fst_zmod_cast @[simp] theorem _root_.Prod.snd_zmod_cast (a : ZMod n) : (cast a : R × S).snd = cast a := by cases n · rfl · simp [ZMod.cast] #align prod.snd_zmod_cast Prod.snd_zmod_cast end theorem natCast_zmod_val {n : ℕ} [NeZero n] (a : ZMod n) : (a.val : ZMod n) = a := by cases n · cases NeZero.ne 0 rfl · apply Fin.cast_val_eq_self #align zmod.nat_cast_zmod_val ZMod.natCast_zmod_val @[deprecated (since := "2024-04-17")] alias nat_cast_zmod_val := natCast_zmod_val theorem natCast_rightInverse [NeZero n] : Function.RightInverse val ((↑) : ℕ → ZMod n) := natCast_zmod_val #align zmod.nat_cast_right_inverse ZMod.natCast_rightInverse @[deprecated (since := "2024-04-17")] alias nat_cast_rightInverse := natCast_rightInverse theorem natCast_zmod_surjective [NeZero n] : Function.Surjective ((↑) : ℕ → ZMod n) := natCast_rightInverse.surjective #align zmod.nat_cast_zmod_surjective ZMod.natCast_zmod_surjective @[deprecated (since := "2024-04-17")] alias nat_cast_zmod_surjective := natCast_zmod_surjective @[norm_cast] theorem intCast_zmod_cast (a : ZMod n) : ((cast a : ℤ) : ZMod n) = a := by cases n · simp [ZMod.cast, ZMod] · dsimp [ZMod.cast, ZMod] erw [Int.cast_natCast, Fin.cast_val_eq_self] #align zmod.int_cast_zmod_cast ZMod.intCast_zmod_cast @[deprecated (since := "2024-04-17")] alias int_cast_zmod_cast := intCast_zmod_cast theorem intCast_rightInverse : Function.RightInverse (cast : ZMod n → ℤ) ((↑) : ℤ → ZMod n) := intCast_zmod_cast #align zmod.int_cast_right_inverse ZMod.intCast_rightInverse @[deprecated (since := "2024-04-17")] alias int_cast_rightInverse := intCast_rightInverse theorem intCast_surjective : Function.Surjective ((↑) : ℤ → ZMod n) := intCast_rightInverse.surjective #align zmod.int_cast_surjective ZMod.intCast_surjective @[deprecated (since := "2024-04-17")] alias int_cast_surjective := intCast_surjective theorem cast_id : ∀ (n) (i : ZMod n), (ZMod.cast i : ZMod n) = i \| 0, _ => Int.cast_id \| _ + 1, i => natCast_zmod_val i #align zmod.cast_id ZMod.cast_id @[simp] theorem cast_id' : (ZMod.cast : ZMod n → ZMod n) = id := funext (cast_id n) #align zmod.cast_id' ZMod.cast_id' variable (R) [Ring R] @[simp] theorem natCast_comp_val [NeZero n] : ((↑) : ℕ → R) ∘ (val : ZMod n → ℕ) = cast := by cases n · cases NeZero.ne 0 rfl rfl #align zmod.nat_cast_comp_val ZMod.natCast_comp_val @[deprecated (since := "2024-04-17")] alias nat_cast_comp_val := natCast_comp_val @[simp] theorem intCast_comp_cast : ((↑) : ℤ → R) ∘ (cast : ZMod n → ℤ) = cast := by cases n · exact congr_arg (Int.cast ∘ ·) ZMod.cast_id' · ext simp [ZMod, ZMod.cast] #align zmod.int_cast_comp_cast ZMod.intCast_comp_cast @[deprecated (since := "2024-04-17")] alias int_cast_comp_cast := intCast_comp_cast variable {R} @[simp] theorem natCast_val [NeZero n] (i : ZMod n) : (i.val : R) = cast i := congr_fun (natCast_comp_val R) i #align zmod.nat_cast_val ZMod.natCast_val @[deprecated (since := "2024-04-17")] alias nat_cast_val := natCast_val @[simp] theorem intCast_cast (i : ZMod n) : ((cast i : ℤ) : R) = cast i := congr_fun (intCast_comp_cast R) i #align zmod.int_cast_cast ZMod.intCast_cast @[deprecated (since := "2024-04-17")] alias int_cast_cast := intCast_cast theorem cast_add_eq_ite {n : ℕ} (a b : ZMod n) : (cast (a + b) : ℤ) = if (n : ℤ) ≤ cast a + cast b then (cast a + cast b - n : ℤ) else cast a + cast b := by cases' n with n · simp; rfl change Fin (n + 1) at a b change ((((a + b) : Fin (n + 1)) : ℕ) : ℤ) = if ((n + 1 : ℕ) : ℤ) ≤ (a : ℕ) + b then _ else _ simp only [Fin.val_add_eq_ite, Int.ofNat_succ, Int.ofNat_le] norm_cast split_ifs with h · rw [Nat.cast_sub h] congr · rfl #align zmod.coe_add_eq_ite ZMod.cast_add_eq_ite theorem intCast_eq_intCast_iff (a b : ℤ) (c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a ≡ b [ZMOD c] := CharP.intCast_eq_intCast (ZMod c) c #align zmod.int_coe_eq_int_coe_iff ZMod.intCast_eq_intCast_iff @[deprecated (since := "2024-04-17")] alias int_cast_eq_int_cast_iff := intCast_eq_intCast_iff theorem intCast_eq_intCast_iff' (a b : ℤ) (c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a % c = b % c := ZMod.intCast_eq_intCast_iff a b c #align zmod.int_coe_eq_int_coe_iff' ZMod.intCast_eq_intCast_iff' @[deprecated (since := "2024-04-17")] alias int_cast_eq_int_cast_iff' := intCast_eq_intCast_iff' theorem natCast_eq_natCast_iff (a b c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a ≡ b [MOD c] := by simpa [Int.natCast_modEq_iff] using ZMod.intCast_eq_intCast_iff a b c #align zmod.nat_coe_eq_nat_coe_iff ZMod.natCast_eq_natCast_iff @[deprecated (since := "2024-04-17")] alias nat_cast_eq_nat_cast_iff := natCast_eq_natCast_iff theorem natCast_eq_natCast_iff' (a b c : ℕ) : (a : ZMod c) = (b : ZMod c) ↔ a % c = b % c := ZMod.natCast_eq_natCast_iff a b c #align zmod.nat_coe_eq_nat_coe_iff' ZMod.natCast_eq_natCast_iff' @[deprecated (since := "2024-04-17")] alias nat_cast_eq_nat_cast_iff' := natCast_eq_natCast_iff'	Mathlib/Data/ZMod/Basic.lean	580	581	theorem intCast_zmod_eq_zero_iff_dvd (a : ℤ) (b : ℕ) : (a : ZMod b) = 0 ↔ (b : ℤ) ∣ a := by	rw [← Int.cast_zero, ZMod.intCast_eq_intCast_iff, Int.modEq_zero_iff_dvd]
import Mathlib.Algebra.Order.Group.Basic import Mathlib.Algebra.Order.Ring.Basic import Mathlib.Combinatorics.Enumerative.DoubleCounting import Mathlib.Data.Finset.Pointwise import Mathlib.Tactic.GCongr #align_import combinatorics.additive.pluennecke_ruzsa from "leanprover-community/mathlib"@"4aab2abced69a9e579b1e6dc2856ed3db48e2cbd" open Nat open NNRat Pointwise namespace Finset variable {α : Type} [CommGroup α] [DecidableEq α] {A B C : Finset α} @[to_additive card_sub_mul_le_card_sub_mul_card_sub "Ruzsa's triangle inequality. Subtraction version."] theorem card_div_mul_le_card_div_mul_card_div (A B C : Finset α) : (A / C).card B.card ≤ (A / B).card * (B / C).card := by rw [← card_product (A / B), ← mul_one ((A / B) ×ˢ (B / C)).card] refine card_mul_le_card_mul (fun b ac ↦ ac.1 * ac.2 = b) (fun x hx ↦ ?_) fun x _ ↦ card_le_one_iff.2 fun hu hv ↦ ((mem_bipartiteBelow _).1 hu).2.symm.trans ?_ obtain ⟨a, ha, c, hc, rfl⟩ := mem_div.1 hx refine card_le_card_of_inj_on (fun b ↦ (a / b, b / c)) (fun b hb ↦ ?_) fun b₁ _ b₂ _ h ↦ ?_ · rw [mem_bipartiteAbove] exact ⟨mk_mem_product (div_mem_div ha hb) (div_mem_div hb hc), div_mul_div_cancel' _ _ _⟩ · exact div_right_injective (Prod.ext_iff.1 h).1 · exact ((mem_bipartiteBelow _).1 hv).2 #align finset.card_div_mul_le_card_div_mul_card_div Finset.card_div_mul_le_card_div_mul_card_div #align finset.card_sub_mul_le_card_sub_mul_card_sub Finset.card_sub_mul_le_card_sub_mul_card_sub @[to_additive card_sub_mul_le_card_add_mul_card_add "Ruzsa's triangle inequality. Sub-add-add version."]	Mathlib/Combinatorics/Additive/PluenneckeRuzsa.lean	63	66	theorem card_div_mul_le_card_mul_mul_card_mul (A B C : Finset α) : (A / C).card * B.card ≤ (A * B).card * (B * C).card := by	rw [← div_inv_eq_mul, ← card_inv B, ← card_inv (B * C), mul_inv, ← div_eq_mul_inv] exact card_div_mul_le_card_div_mul_card_div _ _ _
import Mathlib.Analysis.Convex.Normed import Mathlib.Analysis.NormedSpace.Connected import Mathlib.LinearAlgebra.AffineSpace.ContinuousAffineEquiv open Set variable {F : Type} [AddCommGroup F] [Module ℝ F] [TopologicalSpace F] def AmpleSet (s : Set F) : Prop := ∀ x ∈ s, convexHull ℝ (connectedComponentIn s x) = univ @[simp] theorem ampleSet_univ {F : Type} [NormedAddCommGroup F] [NormedSpace ℝ F] : AmpleSet (univ : Set F) := by intro x _ rw [connectedComponentIn_univ, PreconnectedSpace.connectedComponent_eq_univ, convexHull_univ] @[simp] theorem ampleSet_empty : AmpleSet (∅ : Set F) := fun _ ↦ False.elim namespace AmpleSet theorem union {s t : Set F} (hs : AmpleSet s) (ht : AmpleSet t) : AmpleSet (s ∪ t) := by intro x hx rcases hx with (h \| h) <;> -- The connected component of `x ∈ s` in `s ∪ t` contains the connected component of `x` in `s`, -- hence is also full; similarly for `t`. [have hx := hs x h; have hx := ht x h] <;> rw [← Set.univ_subset_iff, ← hx] <;> apply convexHull_mono <;> apply connectedComponentIn_mono <;> [apply subset_union_left; apply subset_union_right] variable {E : Type*} [AddCommGroup E] [Module ℝ E] [TopologicalSpace E] theorem image {s : Set E} (h : AmpleSet s) (L : E ≃ᵃL[ℝ] F) : AmpleSet (L '' s) := forall_mem_image.mpr fun x hx ↦ calc (convexHull ℝ) (connectedComponentIn (L '' s) (L x)) _ = (convexHull ℝ) (L '' (connectedComponentIn s x)) := .symm <\| congrArg _ <\| L.toHomeomorph.image_connectedComponentIn hx _ = L '' (convexHull ℝ (connectedComponentIn s x)) := .symm <\| L.toAffineMap.image_convexHull _ _ = univ := by rw [h x hx, image_univ, L.surjective.range_eq] theorem image_iff {s : Set E} (L : E ≃ᵃL[ℝ] F) : AmpleSet (L '' s) ↔ AmpleSet s := ⟨fun h ↦ (L.symm_image_image s) ▸ h.image L.symm, fun h ↦ h.image L⟩	Mathlib/Analysis/Convex/AmpleSet.lean	94	96	theorem preimage {s : Set F} (h : AmpleSet s) (L : E ≃ᵃL[ℝ] F) : AmpleSet (L ⁻¹' s) := by	rw [← L.image_symm_eq_preimage] exact h.image L.symm
import Mathlib.Algebra.Polynomial.Reverse import Mathlib.Algebra.Regular.SMul #align_import data.polynomial.monic from "leanprover-community/mathlib"@"cbdf7b565832144d024caa5a550117c6df0204a5" noncomputable section open Finset open Polynomial namespace Polynomial universe u v y variable {R : Type u} {S : Type v} {a b : R} {m n : ℕ} {ι : Type y} section Semiring variable [Semiring R] {p q r : R[X]} theorem monic_zero_iff_subsingleton : Monic (0 : R[X]) ↔ Subsingleton R := subsingleton_iff_zero_eq_one #align polynomial.monic_zero_iff_subsingleton Polynomial.monic_zero_iff_subsingleton theorem not_monic_zero_iff : ¬Monic (0 : R[X]) ↔ (0 : R) ≠ 1 := (monic_zero_iff_subsingleton.trans subsingleton_iff_zero_eq_one.symm).not #align polynomial.not_monic_zero_iff Polynomial.not_monic_zero_iff theorem monic_zero_iff_subsingleton' : Monic (0 : R[X]) ↔ (∀ f g : R[X], f = g) ∧ ∀ a b : R, a = b := Polynomial.monic_zero_iff_subsingleton.trans ⟨by intro simp [eq_iff_true_of_subsingleton], fun h => subsingleton_iff.mpr h.2⟩ #align polynomial.monic_zero_iff_subsingleton' Polynomial.monic_zero_iff_subsingleton' theorem Monic.as_sum (hp : p.Monic) : p = X ^ p.natDegree + ∑ i ∈ range p.natDegree, C (p.coeff i) * X ^ i := by conv_lhs => rw [p.as_sum_range_C_mul_X_pow, sum_range_succ_comm] suffices C (p.coeff p.natDegree) = 1 by rw [this, one_mul] exact congr_arg C hp #align polynomial.monic.as_sum Polynomial.Monic.as_sum theorem ne_zero_of_ne_zero_of_monic (hp : p ≠ 0) (hq : Monic q) : q ≠ 0 := by rintro rfl rw [Monic.def, leadingCoeff_zero] at hq rw [← mul_one p, ← C_1, ← hq, C_0, mul_zero] at hp exact hp rfl #align polynomial.ne_zero_of_ne_zero_of_monic Polynomial.ne_zero_of_ne_zero_of_monic theorem Monic.map [Semiring S] (f : R →+* S) (hp : Monic p) : Monic (p.map f) := by unfold Monic nontriviality have : f p.leadingCoeff ≠ 0 := by rw [show _ = _ from hp, f.map_one] exact one_ne_zero rw [Polynomial.leadingCoeff, coeff_map] suffices p.coeff (p.map f).natDegree = 1 by simp [this] rwa [natDegree_eq_of_degree_eq (degree_map_eq_of_leadingCoeff_ne_zero f this)] #align polynomial.monic.map Polynomial.Monic.map theorem monic_C_mul_of_mul_leadingCoeff_eq_one {b : R} (hp : b * p.leadingCoeff = 1) : Monic (C b * p) := by unfold Monic nontriviality rw [leadingCoeff_mul' _] <;> simp [leadingCoeff_C b, hp] set_option linter.uppercaseLean3 false in #align polynomial.monic_C_mul_of_mul_leading_coeff_eq_one Polynomial.monic_C_mul_of_mul_leadingCoeff_eq_one theorem monic_mul_C_of_leadingCoeff_mul_eq_one {b : R} (hp : p.leadingCoeff * b = 1) : Monic (p * C b) := by unfold Monic nontriviality rw [leadingCoeff_mul' _] <;> simp [leadingCoeff_C b, hp] set_option linter.uppercaseLean3 false in #align polynomial.monic_mul_C_of_leading_coeff_mul_eq_one Polynomial.monic_mul_C_of_leadingCoeff_mul_eq_one theorem monic_of_degree_le (n : ℕ) (H1 : degree p ≤ n) (H2 : coeff p n = 1) : Monic p := Decidable.byCases (fun H : degree p < n => eq_of_zero_eq_one (H2 ▸ (coeff_eq_zero_of_degree_lt H).symm) _ _) fun H : ¬degree p < n => by rwa [Monic, Polynomial.leadingCoeff, natDegree, (lt_or_eq_of_le H1).resolve_left H] #align polynomial.monic_of_degree_le Polynomial.monic_of_degree_le theorem monic_X_pow_add {n : ℕ} (H : degree p ≤ n) : Monic (X ^ (n + 1) + p) := have H1 : degree p < (n + 1 : ℕ) := lt_of_le_of_lt H (WithBot.coe_lt_coe.2 (Nat.lt_succ_self n)) monic_of_degree_le (n + 1) (le_trans (degree_add_le _ _) (max_le (degree_X_pow_le _) (le_of_lt H1))) (by rw [coeff_add, coeff_X_pow, if_pos rfl, coeff_eq_zero_of_degree_lt H1, add_zero]) set_option linter.uppercaseLean3 false in #align polynomial.monic_X_pow_add Polynomial.monic_X_pow_add variable (a) in theorem monic_X_pow_add_C {n : ℕ} (h : n ≠ 0) : (X ^ n + C a).Monic := by obtain ⟨k, rfl⟩ := Nat.exists_eq_succ_of_ne_zero h exact monic_X_pow_add <\| degree_C_le.trans Nat.WithBot.coe_nonneg theorem monic_X_add_C (x : R) : Monic (X + C x) := pow_one (X : R[X]) ▸ monic_X_pow_add_C x one_ne_zero set_option linter.uppercaseLean3 false in #align polynomial.monic_X_add_C Polynomial.monic_X_add_C theorem Monic.mul (hp : Monic p) (hq : Monic q) : Monic (p * q) := letI := Classical.decEq R if h0 : (0 : R) = 1 then haveI := subsingleton_of_zero_eq_one h0 Subsingleton.elim _ _ else by have : p.leadingCoeff * q.leadingCoeff ≠ 0 := by simp [Monic.def.1 hp, Monic.def.1 hq, Ne.symm h0] rw [Monic.def, leadingCoeff_mul' this, Monic.def.1 hp, Monic.def.1 hq, one_mul] #align polynomial.monic.mul Polynomial.Monic.mul theorem Monic.pow (hp : Monic p) : ∀ n : ℕ, Monic (p ^ n) \| 0 => monic_one \| n + 1 => by rw [pow_succ] exact (Monic.pow hp n).mul hp #align polynomial.monic.pow Polynomial.Monic.pow theorem Monic.add_of_left (hp : Monic p) (hpq : degree q < degree p) : Monic (p + q) := by rwa [Monic, add_comm, leadingCoeff_add_of_degree_lt hpq] #align polynomial.monic.add_of_left Polynomial.Monic.add_of_left theorem Monic.add_of_right (hq : Monic q) (hpq : degree p < degree q) : Monic (p + q) := by rwa [Monic, leadingCoeff_add_of_degree_lt hpq] #align polynomial.monic.add_of_right Polynomial.Monic.add_of_right theorem Monic.of_mul_monic_left (hp : p.Monic) (hpq : (p * q).Monic) : q.Monic := by contrapose! hpq rw [Monic.def] at hpq ⊢ rwa [leadingCoeff_monic_mul hp] #align polynomial.monic.of_mul_monic_left Polynomial.Monic.of_mul_monic_left theorem Monic.of_mul_monic_right (hq : q.Monic) (hpq : (p * q).Monic) : p.Monic := by contrapose! hpq rw [Monic.def] at hpq ⊢ rwa [leadingCoeff_mul_monic hq] #align polynomial.monic.of_mul_monic_right Polynomial.Monic.of_mul_monic_right namespace Monic @[simp] theorem natDegree_eq_zero_iff_eq_one (hp : p.Monic) : p.natDegree = 0 ↔ p = 1 := by constructor <;> intro h swap · rw [h] exact natDegree_one have : p = C (p.coeff 0) := by rw [← Polynomial.degree_le_zero_iff] rwa [Polynomial.natDegree_eq_zero_iff_degree_le_zero] at h rw [this] rw [← h, ← Polynomial.leadingCoeff, Monic.def.1 hp, C_1] #align polynomial.monic.nat_degree_eq_zero_iff_eq_one Polynomial.Monic.natDegree_eq_zero_iff_eq_one @[simp] theorem degree_le_zero_iff_eq_one (hp : p.Monic) : p.degree ≤ 0 ↔ p = 1 := by rw [← hp.natDegree_eq_zero_iff_eq_one, natDegree_eq_zero_iff_degree_le_zero] #align polynomial.monic.degree_le_zero_iff_eq_one Polynomial.Monic.degree_le_zero_iff_eq_one theorem natDegree_mul (hp : p.Monic) (hq : q.Monic) : (p * q).natDegree = p.natDegree + q.natDegree := by nontriviality R apply natDegree_mul' simp [hp.leadingCoeff, hq.leadingCoeff] #align polynomial.monic.nat_degree_mul Polynomial.Monic.natDegree_mul theorem degree_mul_comm (hp : p.Monic) (q : R[X]) : (p * q).degree = (q * p).degree := by by_cases h : q = 0 · simp [h] rw [degree_mul', hp.degree_mul] · exact add_comm _ _ · rwa [hp.leadingCoeff, one_mul, leadingCoeff_ne_zero] #align polynomial.monic.degree_mul_comm Polynomial.Monic.degree_mul_comm nonrec theorem natDegree_mul' (hp : p.Monic) (hq : q ≠ 0) : (p * q).natDegree = p.natDegree + q.natDegree := by rw [natDegree_mul'] simpa [hp.leadingCoeff, leadingCoeff_ne_zero] #align polynomial.monic.nat_degree_mul' Polynomial.Monic.natDegree_mul' theorem natDegree_mul_comm (hp : p.Monic) (q : R[X]) : (p * q).natDegree = (q * p).natDegree := by by_cases h : q = 0 · simp [h] rw [hp.natDegree_mul' h, Polynomial.natDegree_mul', add_comm] simpa [hp.leadingCoeff, leadingCoeff_ne_zero] #align polynomial.monic.nat_degree_mul_comm Polynomial.Monic.natDegree_mul_comm theorem not_dvd_of_natDegree_lt (hp : Monic p) (h0 : q ≠ 0) (hl : natDegree q < natDegree p) : ¬p ∣ q := by rintro ⟨r, rfl⟩ rw [hp.natDegree_mul' <\| right_ne_zero_of_mul h0] at hl exact hl.not_le (Nat.le_add_right _ _) #align polynomial.monic.not_dvd_of_nat_degree_lt Polynomial.Monic.not_dvd_of_natDegree_lt theorem not_dvd_of_degree_lt (hp : Monic p) (h0 : q ≠ 0) (hl : degree q < degree p) : ¬p ∣ q := Monic.not_dvd_of_natDegree_lt hp h0 <\| natDegree_lt_natDegree h0 hl #align polynomial.monic.not_dvd_of_degree_lt Polynomial.Monic.not_dvd_of_degree_lt	Mathlib/Algebra/Polynomial/Monic.lean	214	220	theorem nextCoeff_mul (hp : Monic p) (hq : Monic q) : nextCoeff (p * q) = nextCoeff p + nextCoeff q := by	nontriviality simp only [← coeff_one_reverse] rw [reverse_mul] <;> simp [coeff_mul, antidiagonal, hp.leadingCoeff, hq.leadingCoeff, add_comm, show Nat.succ 0 = 1 from rfl]
import Mathlib.MeasureTheory.Group.Arithmetic #align_import measure_theory.group.pointwise from "leanprover-community/mathlib"@"66f7114a1d5cba41c47d417a034bbb2e96cf564a" open Pointwise open Set @[to_additive]	Mathlib/MeasureTheory/Group/Pointwise.lean	24	28	theorem MeasurableSet.const_smul {G α : Type*} [Group G] [MulAction G α] [MeasurableSpace G] [MeasurableSpace α] [MeasurableSMul G α] {s : Set α} (hs : MeasurableSet s) (a : G) : MeasurableSet (a • s) := by	rw [← preimage_smul_inv] exact measurable_const_smul _ hs
import Mathlib.Algebra.Group.Equiv.Basic import Mathlib.Data.ENat.Lattice import Mathlib.Data.Part import Mathlib.Tactic.NormNum #align_import data.nat.part_enat from "leanprover-community/mathlib"@"3ff3f2d6a3118b8711063de7111a0d77a53219a8" open Part hiding some def PartENat : Type := Part ℕ #align part_enat PartENat namespace PartENat @[coe] def some : ℕ → PartENat := Part.some #align part_enat.some PartENat.some instance : Zero PartENat := ⟨some 0⟩ instance : Inhabited PartENat := ⟨0⟩ instance : One PartENat := ⟨some 1⟩ instance : Add PartENat := ⟨fun x y => ⟨x.Dom ∧ y.Dom, fun h => get x h.1 + get y h.2⟩⟩ instance (n : ℕ) : Decidable (some n).Dom := isTrue trivial @[simp] theorem dom_some (x : ℕ) : (some x).Dom := trivial #align part_enat.dom_some PartENat.dom_some instance addCommMonoid : AddCommMonoid PartENat where add := (· + ·) zero := 0 add_comm x y := Part.ext' and_comm fun _ _ => add_comm _ _ zero_add x := Part.ext' (true_and_iff _) fun _ _ => zero_add _ add_zero x := Part.ext' (and_true_iff _) fun _ _ => add_zero _ add_assoc x y z := Part.ext' and_assoc fun _ _ => add_assoc _ _ _ nsmul := nsmulRec instance : AddCommMonoidWithOne PartENat := { PartENat.addCommMonoid with one := 1 natCast := some natCast_zero := rfl natCast_succ := fun _ => Part.ext' (true_and_iff _).symm fun _ _ => rfl } theorem some_eq_natCast (n : ℕ) : some n = n := rfl #align part_enat.some_eq_coe PartENat.some_eq_natCast instance : CharZero PartENat where cast_injective := Part.some_injective theorem natCast_inj {x y : ℕ} : (x : PartENat) = y ↔ x = y := Nat.cast_inj #align part_enat.coe_inj PartENat.natCast_inj @[simp] theorem dom_natCast (x : ℕ) : (x : PartENat).Dom := trivial #align part_enat.dom_coe PartENat.dom_natCast -- See note [no_index around OfNat.ofNat] @[simp] theorem dom_ofNat (x : ℕ) [x.AtLeastTwo] : (no_index (OfNat.ofNat x : PartENat)).Dom := trivial @[simp] theorem dom_zero : (0 : PartENat).Dom := trivial @[simp] theorem dom_one : (1 : PartENat).Dom := trivial instance : CanLift PartENat ℕ (↑) Dom := ⟨fun n hn => ⟨n.get hn, Part.some_get _⟩⟩ instance : LE PartENat := ⟨fun x y => ∃ h : y.Dom → x.Dom, ∀ hy : y.Dom, x.get (h hy) ≤ y.get hy⟩ instance : Top PartENat := ⟨none⟩ instance : Bot PartENat := ⟨0⟩ instance : Sup PartENat := ⟨fun x y => ⟨x.Dom ∧ y.Dom, fun h => x.get h.1 ⊔ y.get h.2⟩⟩ theorem le_def (x y : PartENat) : x ≤ y ↔ ∃ h : y.Dom → x.Dom, ∀ hy : y.Dom, x.get (h hy) ≤ y.get hy := Iff.rfl #align part_enat.le_def PartENat.le_def @[elab_as_elim] protected theorem casesOn' {P : PartENat → Prop} : ∀ a : PartENat, P ⊤ → (∀ n : ℕ, P (some n)) → P a := Part.induction_on #align part_enat.cases_on' PartENat.casesOn' @[elab_as_elim] protected theorem casesOn {P : PartENat → Prop} : ∀ a : PartENat, P ⊤ → (∀ n : ℕ, P n) → P a := by exact PartENat.casesOn' #align part_enat.cases_on PartENat.casesOn -- not a simp lemma as we will provide a `LinearOrderedAddCommMonoidWithTop` instance later theorem top_add (x : PartENat) : ⊤ + x = ⊤ := Part.ext' (false_and_iff _) fun h => h.left.elim #align part_enat.top_add PartENat.top_add -- not a simp lemma as we will provide a `LinearOrderedAddCommMonoidWithTop` instance later theorem add_top (x : PartENat) : x + ⊤ = ⊤ := by rw [add_comm, top_add] #align part_enat.add_top PartENat.add_top @[simp] theorem natCast_get {x : PartENat} (h : x.Dom) : (x.get h : PartENat) = x := by exact Part.ext' (iff_of_true trivial h) fun _ _ => rfl #align part_enat.coe_get PartENat.natCast_get @[simp, norm_cast] theorem get_natCast' (x : ℕ) (h : (x : PartENat).Dom) : get (x : PartENat) h = x := by rw [← natCast_inj, natCast_get] #align part_enat.get_coe' PartENat.get_natCast' theorem get_natCast {x : ℕ} : get (x : PartENat) (dom_natCast x) = x := get_natCast' _ _ #align part_enat.get_coe PartENat.get_natCast theorem coe_add_get {x : ℕ} {y : PartENat} (h : ((x : PartENat) + y).Dom) : get ((x : PartENat) + y) h = x + get y h.2 := by rfl #align part_enat.coe_add_get PartENat.coe_add_get @[simp] theorem get_add {x y : PartENat} (h : (x + y).Dom) : get (x + y) h = x.get h.1 + y.get h.2 := rfl #align part_enat.get_add PartENat.get_add @[simp] theorem get_zero (h : (0 : PartENat).Dom) : (0 : PartENat).get h = 0 := rfl #align part_enat.get_zero PartENat.get_zero @[simp] theorem get_one (h : (1 : PartENat).Dom) : (1 : PartENat).get h = 1 := rfl #align part_enat.get_one PartENat.get_one -- See note [no_index around OfNat.ofNat] @[simp] theorem get_ofNat' (x : ℕ) [x.AtLeastTwo] (h : (no_index (OfNat.ofNat x : PartENat)).Dom) : Part.get (no_index (OfNat.ofNat x : PartENat)) h = (no_index (OfNat.ofNat x)) := get_natCast' x h nonrec theorem get_eq_iff_eq_some {a : PartENat} {ha : a.Dom} {b : ℕ} : a.get ha = b ↔ a = some b := get_eq_iff_eq_some #align part_enat.get_eq_iff_eq_some PartENat.get_eq_iff_eq_some theorem get_eq_iff_eq_coe {a : PartENat} {ha : a.Dom} {b : ℕ} : a.get ha = b ↔ a = b := by rw [get_eq_iff_eq_some] rfl #align part_enat.get_eq_iff_eq_coe PartENat.get_eq_iff_eq_coe theorem dom_of_le_of_dom {x y : PartENat} : x ≤ y → y.Dom → x.Dom := fun ⟨h, _⟩ => h #align part_enat.dom_of_le_of_dom PartENat.dom_of_le_of_dom theorem dom_of_le_some {x : PartENat} {y : ℕ} (h : x ≤ some y) : x.Dom := dom_of_le_of_dom h trivial #align part_enat.dom_of_le_some PartENat.dom_of_le_some theorem dom_of_le_natCast {x : PartENat} {y : ℕ} (h : x ≤ y) : x.Dom := by exact dom_of_le_some h #align part_enat.dom_of_le_coe PartENat.dom_of_le_natCast instance decidableLe (x y : PartENat) [Decidable x.Dom] [Decidable y.Dom] : Decidable (x ≤ y) := if hx : x.Dom then decidable_of_decidable_of_iff (by rw [le_def]) else if hy : y.Dom then isFalse fun h => hx <\| dom_of_le_of_dom h hy else isTrue ⟨fun h => (hy h).elim, fun h => (hy h).elim⟩ #align part_enat.decidable_le PartENat.decidableLe -- Porting note: Removed. Use `Nat.castAddMonoidHom` instead. #noalign part_enat.coe_hom #noalign part_enat.coe_coe_hom instance partialOrder : PartialOrder PartENat where le := (· ≤ ·) le_refl _ := ⟨id, fun _ => le_rfl⟩ le_trans := fun _ _ _ ⟨hxy₁, hxy₂⟩ ⟨hyz₁, hyz₂⟩ => ⟨hxy₁ ∘ hyz₁, fun _ => le_trans (hxy₂ _) (hyz₂ _)⟩ lt_iff_le_not_le _ _ := Iff.rfl le_antisymm := fun _ _ ⟨hxy₁, hxy₂⟩ ⟨hyx₁, hyx₂⟩ => Part.ext' ⟨hyx₁, hxy₁⟩ fun _ _ => le_antisymm (hxy₂ _) (hyx₂ _) theorem lt_def (x y : PartENat) : x < y ↔ ∃ hx : x.Dom, ∀ hy : y.Dom, x.get hx < y.get hy := by rw [lt_iff_le_not_le, le_def, le_def, not_exists] constructor · rintro ⟨⟨hyx, H⟩, h⟩ by_cases hx : x.Dom · use hx intro hy specialize H hy specialize h fun _ => hy rw [not_forall] at h cases' h with hx' h rw [not_le] at h exact h · specialize h fun hx' => (hx hx').elim rw [not_forall] at h cases' h with hx' h exact (hx hx').elim · rintro ⟨hx, H⟩ exact ⟨⟨fun _ => hx, fun hy => (H hy).le⟩, fun hxy h => not_lt_of_le (h _) (H _)⟩ #align part_enat.lt_def PartENat.lt_def noncomputable instance orderedAddCommMonoid : OrderedAddCommMonoid PartENat := { PartENat.partialOrder, PartENat.addCommMonoid with add_le_add_left := fun a b ⟨h₁, h₂⟩ c => PartENat.casesOn c (by simp [top_add]) fun c => ⟨fun h => And.intro (dom_natCast _) (h₁ h.2), fun h => by simpa only [coe_add_get] using add_le_add_left (h₂ _) c⟩ } instance semilatticeSup : SemilatticeSup PartENat := { PartENat.partialOrder with sup := (· ⊔ ·) le_sup_left := fun _ _ => ⟨And.left, fun _ => le_sup_left⟩ le_sup_right := fun _ _ => ⟨And.right, fun _ => le_sup_right⟩ sup_le := fun _ _ _ ⟨hx₁, hx₂⟩ ⟨hy₁, hy₂⟩ => ⟨fun hz => ⟨hx₁ hz, hy₁ hz⟩, fun _ => sup_le (hx₂ _) (hy₂ _)⟩ } #align part_enat.semilattice_sup PartENat.semilatticeSup instance orderBot : OrderBot PartENat where bot := ⊥ bot_le _ := ⟨fun _ => trivial, fun _ => Nat.zero_le _⟩ #align part_enat.order_bot PartENat.orderBot instance orderTop : OrderTop PartENat where top := ⊤ le_top _ := ⟨fun h => False.elim h, fun hy => False.elim hy⟩ #align part_enat.order_top PartENat.orderTop instance : ZeroLEOneClass PartENat where zero_le_one := bot_le theorem coe_le_coe {x y : ℕ} : (x : PartENat) ≤ y ↔ x ≤ y := Nat.cast_le #align part_enat.coe_le_coe PartENat.coe_le_coe theorem coe_lt_coe {x y : ℕ} : (x : PartENat) < y ↔ x < y := Nat.cast_lt #align part_enat.coe_lt_coe PartENat.coe_lt_coe @[simp] theorem get_le_get {x y : PartENat} {hx : x.Dom} {hy : y.Dom} : x.get hx ≤ y.get hy ↔ x ≤ y := by conv => lhs rw [← coe_le_coe, natCast_get, natCast_get] #align part_enat.get_le_get PartENat.get_le_get theorem le_coe_iff (x : PartENat) (n : ℕ) : x ≤ n ↔ ∃ h : x.Dom, x.get h ≤ n := by show (∃ h : True → x.Dom, _) ↔ ∃ h : x.Dom, x.get h ≤ n simp only [forall_prop_of_true, dom_natCast, get_natCast'] #align part_enat.le_coe_iff PartENat.le_coe_iff theorem lt_coe_iff (x : PartENat) (n : ℕ) : x < n ↔ ∃ h : x.Dom, x.get h < n := by simp only [lt_def, forall_prop_of_true, get_natCast', dom_natCast] #align part_enat.lt_coe_iff PartENat.lt_coe_iff theorem coe_le_iff (n : ℕ) (x : PartENat) : (n : PartENat) ≤ x ↔ ∀ h : x.Dom, n ≤ x.get h := by rw [← some_eq_natCast] simp only [le_def, exists_prop_of_true, dom_some, forall_true_iff] rfl #align part_enat.coe_le_iff PartENat.coe_le_iff theorem coe_lt_iff (n : ℕ) (x : PartENat) : (n : PartENat) < x ↔ ∀ h : x.Dom, n < x.get h := by rw [← some_eq_natCast] simp only [lt_def, exists_prop_of_true, dom_some, forall_true_iff] rfl #align part_enat.coe_lt_iff PartENat.coe_lt_iff nonrec theorem eq_zero_iff {x : PartENat} : x = 0 ↔ x ≤ 0 := eq_bot_iff #align part_enat.eq_zero_iff PartENat.eq_zero_iff theorem ne_zero_iff {x : PartENat} : x ≠ 0 ↔ ⊥ < x := bot_lt_iff_ne_bot.symm #align part_enat.ne_zero_iff PartENat.ne_zero_iff theorem dom_of_lt {x y : PartENat} : x < y → x.Dom := PartENat.casesOn x not_top_lt fun _ _ => dom_natCast _ #align part_enat.dom_of_lt PartENat.dom_of_lt theorem top_eq_none : (⊤ : PartENat) = Part.none := rfl #align part_enat.top_eq_none PartENat.top_eq_none @[simp] theorem natCast_lt_top (x : ℕ) : (x : PartENat) < ⊤ := Ne.lt_top fun h => absurd (congr_arg Dom h) <\| by simp only [dom_natCast]; exact true_ne_false #align part_enat.coe_lt_top PartENat.natCast_lt_top @[simp] theorem zero_lt_top : (0 : PartENat) < ⊤ := natCast_lt_top 0 @[simp] theorem one_lt_top : (1 : PartENat) < ⊤ := natCast_lt_top 1 -- See note [no_index around OfNat.ofNat] @[simp] theorem ofNat_lt_top (x : ℕ) [x.AtLeastTwo] : (no_index (OfNat.ofNat x : PartENat)) < ⊤ := natCast_lt_top x @[simp] theorem natCast_ne_top (x : ℕ) : (x : PartENat) ≠ ⊤ := ne_of_lt (natCast_lt_top x) #align part_enat.coe_ne_top PartENat.natCast_ne_top @[simp] theorem zero_ne_top : (0 : PartENat) ≠ ⊤ := natCast_ne_top 0 @[simp] theorem one_ne_top : (1 : PartENat) ≠ ⊤ := natCast_ne_top 1 -- See note [no_index around OfNat.ofNat] @[simp] theorem ofNat_ne_top (x : ℕ) [x.AtLeastTwo] : (no_index (OfNat.ofNat x : PartENat)) ≠ ⊤ := natCast_ne_top x theorem not_isMax_natCast (x : ℕ) : ¬IsMax (x : PartENat) := not_isMax_of_lt (natCast_lt_top x) #align part_enat.not_is_max_coe PartENat.not_isMax_natCast theorem ne_top_iff {x : PartENat} : x ≠ ⊤ ↔ ∃ n : ℕ, x = n := by simpa only [← some_eq_natCast] using Part.ne_none_iff #align part_enat.ne_top_iff PartENat.ne_top_iff theorem ne_top_iff_dom {x : PartENat} : x ≠ ⊤ ↔ x.Dom := by classical exact not_iff_comm.1 Part.eq_none_iff'.symm #align part_enat.ne_top_iff_dom PartENat.ne_top_iff_dom theorem not_dom_iff_eq_top {x : PartENat} : ¬x.Dom ↔ x = ⊤ := Iff.not_left ne_top_iff_dom.symm #align part_enat.not_dom_iff_eq_top PartENat.not_dom_iff_eq_top theorem ne_top_of_lt {x y : PartENat} (h : x < y) : x ≠ ⊤ := ne_of_lt <\| lt_of_lt_of_le h le_top #align part_enat.ne_top_of_lt PartENat.ne_top_of_lt	Mathlib/Data/Nat/PartENat.lean	417	424	theorem eq_top_iff_forall_lt (x : PartENat) : x = ⊤ ↔ ∀ n : ℕ, (n : PartENat) < x := by	constructor · rintro rfl n exact natCast_lt_top _ · contrapose! rw [ne_top_iff] rintro ⟨n, rfl⟩ exact ⟨n, irrefl _⟩
import Batteries.Data.List.Lemmas namespace List universe u v variable {α : Type u} {β : Type v} @[simp] theorem eraseIdx_zero (l : List α) : eraseIdx l 0 = tail l := by cases l <;> rfl theorem eraseIdx_eq_take_drop_succ : ∀ (l : List α) (i : Nat), l.eraseIdx i = l.take i ++ l.drop (i + 1) \| nil, _ => by simp \| a::l, 0 => by simp \| a::l, i + 1 => by simp [eraseIdx_eq_take_drop_succ l i] theorem eraseIdx_sublist : ∀ (l : List α) (k : Nat), eraseIdx l k <+ l \| [], _ => by simp \| a::l, 0 => by simp \| a::l, k + 1 => by simp [eraseIdx_sublist l k] theorem eraseIdx_subset (l : List α) (k : Nat) : eraseIdx l k ⊆ l := (eraseIdx_sublist l k).subset @[simp] theorem eraseIdx_eq_self : ∀ {l : List α} {k : Nat}, eraseIdx l k = l ↔ length l ≤ k \| [], _ => by simp \| a::l, 0 => by simp [(cons_ne_self _ _).symm] \| a::l, k + 1 => by simp [eraseIdx_eq_self] alias ⟨_, eraseIdx_of_length_le⟩ := eraseIdx_eq_self theorem eraseIdx_append_of_lt_length {l : List α} {k : Nat} (hk : k < length l) (l' : List α) : eraseIdx (l ++ l') k = eraseIdx l k ++ l' := by rw [eraseIdx_eq_take_drop_succ, take_append_of_le_length, drop_append_of_le_length, eraseIdx_eq_take_drop_succ, append_assoc] all_goals omega theorem eraseIdx_append_of_length_le {l : List α} {k : Nat} (hk : length l ≤ k) (l' : List α) : eraseIdx (l ++ l') k = l ++ eraseIdx l' (k - length l) := by rw [eraseIdx_eq_take_drop_succ, eraseIdx_eq_take_drop_succ, take_append_eq_append_take, drop_append_eq_append_drop, take_all_of_le hk, drop_eq_nil_of_le (by omega), nil_append, append_assoc] congr omega protected theorem IsPrefix.eraseIdx {l l' : List α} (h : l <+: l') (k : Nat) : eraseIdx l k <+: eraseIdx l' k := by rcases h with ⟨t, rfl⟩ if hkl : k < length l then simp [eraseIdx_append_of_lt_length hkl] else rw [Nat.not_lt] at hkl simp [eraseIdx_append_of_length_le hkl, eraseIdx_of_length_le hkl] theorem mem_eraseIdx_iff_get {x : α} : ∀ {l} {k}, x ∈ eraseIdx l k ↔ ∃ i : Fin l.length, ↑i ≠ k ∧ l.get i = x \| [], _ => by simp only [eraseIdx, Fin.exists_iff, not_mem_nil, false_iff] rintro ⟨i, h, -⟩ exact Nat.not_lt_zero _ h \| a::l, 0 => by simp [Fin.exists_fin_succ, mem_iff_get] \| a::l, k+1 => by simp [Fin.exists_fin_succ, mem_eraseIdx_iff_get, @eq_comm _ a, k.succ_ne_zero.symm]	.lake/packages/batteries/Batteries/Data/List/EraseIdx.lean	76	80	theorem mem_eraseIdx_iff_get? {x : α} {l} {k} : x ∈ eraseIdx l k ↔ ∃ i ≠ k, l.get? i = x := by	simp only [mem_eraseIdx_iff_get, Fin.exists_iff, exists_and_left, get_eq_iff, exists_prop] refine exists_congr fun i => and_congr_right' <\| and_iff_right_of_imp fun h => ?_ obtain ⟨h, -⟩ := get?_eq_some.1 h exact h
import Mathlib.Analysis.SpecialFunctions.Pow.Asymptotics import Mathlib.NumberTheory.Liouville.Basic import Mathlib.Topology.Instances.Irrational #align_import number_theory.liouville.liouville_with from "leanprover-community/mathlib"@"0b9eaaa7686280fad8cce467f5c3c57ee6ce77f8" open Filter Metric Real Set open scoped Filter Topology def LiouvilleWith (p x : ℝ) : Prop := ∃ C, ∃ᶠ n : ℕ in atTop, ∃ m : ℤ, x ≠ m / n ∧ \|x - m / n\| < C / n ^ p #align liouville_with LiouvilleWith theorem liouvilleWith_one (x : ℝ) : LiouvilleWith 1 x := by use 2 refine ((eventually_gt_atTop 0).mono fun n hn => ?_).frequently have hn' : (0 : ℝ) < n := by simpa have : x < ↑(⌊x * ↑n⌋ + 1) / ↑n := by rw [lt_div_iff hn', Int.cast_add, Int.cast_one]; exact Int.lt_floor_add_one _ refine ⟨⌊x * n⌋ + 1, this.ne, ?_⟩ rw [abs_sub_comm, abs_of_pos (sub_pos.2 this), rpow_one, sub_lt_iff_lt_add', add_div_eq_mul_add_div _ _ hn'.ne'] gcongr calc _ ≤ x * n + 1 := by push_cast; gcongr; apply Int.floor_le _ < x * n + 2 := by linarith #align liouville_with_one liouvilleWith_one namespace LiouvilleWith variable {p q x y : ℝ} {r : ℚ} {m : ℤ} {n : ℕ}	Mathlib/NumberTheory/Liouville/LiouvilleWith.lean	76	85	theorem exists_pos (h : LiouvilleWith p x) : ∃ (C : ℝ) (_h₀ : 0 < C), ∃ᶠ n : ℕ in atTop, 1 ≤ n ∧ ∃ m : ℤ, x ≠ m / n ∧ \|x - m / n\| < C / n ^ p := by	rcases h with ⟨C, hC⟩ refine ⟨max C 1, zero_lt_one.trans_le <\| le_max_right _ _, ?_⟩ refine ((eventually_ge_atTop 1).and_frequently hC).mono ?_ rintro n ⟨hle, m, hne, hlt⟩ refine ⟨hle, m, hne, hlt.trans_le ?_⟩ gcongr apply le_max_left
import Mathlib.Data.Finsupp.Multiset import Mathlib.Data.Nat.GCD.BigOperators import Mathlib.Data.Nat.PrimeFin import Mathlib.NumberTheory.Padics.PadicVal import Mathlib.Order.Interval.Finset.Nat #align_import data.nat.factorization.basic from "leanprover-community/mathlib"@"f694c7dead66f5d4c80f446c796a5aad14707f0e" -- Workaround for lean4#2038 attribute [-instance] instBEqNat open Nat Finset List Finsupp namespace Nat variable {a b m n p : ℕ} def factorization (n : ℕ) : ℕ →₀ ℕ where support := n.primeFactors toFun p := if p.Prime then padicValNat p n else 0 mem_support_toFun := by simp [not_or]; aesop #align nat.factorization Nat.factorization @[simp] lemma support_factorization (n : ℕ) : (factorization n).support = n.primeFactors := rfl theorem factorization_def (n : ℕ) {p : ℕ} (pp : p.Prime) : n.factorization p = padicValNat p n := by simpa [factorization] using absurd pp #align nat.factorization_def Nat.factorization_def @[simp] theorem factors_count_eq {n p : ℕ} : n.factors.count p = n.factorization p := by rcases n.eq_zero_or_pos with (rfl \| hn0) · simp [factorization, count] if pp : p.Prime then ?_ else rw [count_eq_zero_of_not_mem (mt prime_of_mem_factors pp)] simp [factorization, pp] simp only [factorization_def _ pp] apply _root_.le_antisymm · rw [le_padicValNat_iff_replicate_subperm_factors pp hn0.ne'] exact List.le_count_iff_replicate_sublist.mp le_rfl \|>.subperm · rw [← lt_add_one_iff, lt_iff_not_ge, ge_iff_le, le_padicValNat_iff_replicate_subperm_factors pp hn0.ne'] intro h have := h.count_le p simp at this #align nat.factors_count_eq Nat.factors_count_eq theorem factorization_eq_factors_multiset (n : ℕ) : n.factorization = Multiset.toFinsupp (n.factors : Multiset ℕ) := by ext p simp #align nat.factorization_eq_factors_multiset Nat.factorization_eq_factors_multiset theorem multiplicity_eq_factorization {n p : ℕ} (pp : p.Prime) (hn : n ≠ 0) : multiplicity p n = n.factorization p := by simp [factorization, pp, padicValNat_def' pp.ne_one hn.bot_lt] #align nat.multiplicity_eq_factorization Nat.multiplicity_eq_factorization @[simp] theorem factorization_prod_pow_eq_self {n : ℕ} (hn : n ≠ 0) : n.factorization.prod (· ^ ·) = n := by rw [factorization_eq_factors_multiset n] simp only [← prod_toMultiset, factorization, Multiset.prod_coe, Multiset.toFinsupp_toMultiset] exact prod_factors hn #align nat.factorization_prod_pow_eq_self Nat.factorization_prod_pow_eq_self theorem eq_of_factorization_eq {a b : ℕ} (ha : a ≠ 0) (hb : b ≠ 0) (h : ∀ p : ℕ, a.factorization p = b.factorization p) : a = b := eq_of_perm_factors ha hb (by simpa only [List.perm_iff_count, factors_count_eq] using h) #align nat.eq_of_factorization_eq Nat.eq_of_factorization_eq theorem factorization_inj : Set.InjOn factorization { x : ℕ \| x ≠ 0 } := fun a ha b hb h => eq_of_factorization_eq ha hb fun p => by simp [h] #align nat.factorization_inj Nat.factorization_inj @[simp] theorem factorization_zero : factorization 0 = 0 := by ext; simp [factorization] #align nat.factorization_zero Nat.factorization_zero @[simp]	Mathlib/Data/Nat/Factorization/Basic.lean	120	120	theorem factorization_one : factorization 1 = 0 := by	ext; simp [factorization]
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	Mathlib/Analysis/SpecialFunctions/Trigonometric/Inverse.lean	153	159	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)
import Mathlib.Algebra.Polynomial.Degree.Definitions import Mathlib.Algebra.Polynomial.Eval import Mathlib.Algebra.Polynomial.Monic import Mathlib.Algebra.Polynomial.RingDivision import Mathlib.Tactic.Abel #align_import ring_theory.polynomial.pochhammer from "leanprover-community/mathlib"@"53b216bcc1146df1c4a0a86877890ea9f1f01589" universe u v open Polynomial open Polynomial section Semiring variable (S : Type u) [Semiring S] noncomputable def ascPochhammer : ℕ → S[X] \| 0 => 1 \| n + 1 => X * (ascPochhammer n).comp (X + 1) #align pochhammer ascPochhammer @[simp] theorem ascPochhammer_zero : ascPochhammer S 0 = 1 := rfl #align pochhammer_zero ascPochhammer_zero @[simp] theorem ascPochhammer_one : ascPochhammer S 1 = X := by simp [ascPochhammer] #align pochhammer_one ascPochhammer_one theorem ascPochhammer_succ_left (n : ℕ) : ascPochhammer S (n + 1) = X * (ascPochhammer S n).comp (X + 1) := by rw [ascPochhammer] #align pochhammer_succ_left ascPochhammer_succ_left theorem monic_ascPochhammer (n : ℕ) [Nontrivial S] [NoZeroDivisors S] : Monic <\| ascPochhammer S n := by induction' n with n hn · simp · have : leadingCoeff (X + 1 : S[X]) = 1 := leadingCoeff_X_add_C 1 rw [ascPochhammer_succ_left, Monic.def, leadingCoeff_mul, leadingCoeff_comp (ne_zero_of_eq_one <\| natDegree_X_add_C 1 : natDegree (X + 1) ≠ 0), hn, monic_X, one_mul, one_mul, this, one_pow] section variable {S} {T : Type v} [Semiring T] @[simp] theorem ascPochhammer_map (f : S →+* T) (n : ℕ) : (ascPochhammer S n).map f = ascPochhammer T n := by induction' n with n ih · simp · simp [ih, ascPochhammer_succ_left, map_comp] #align pochhammer_map ascPochhammer_map theorem ascPochhammer_eval₂ (f : S →+* T) (n : ℕ) (t : T) : (ascPochhammer T n).eval t = (ascPochhammer S n).eval₂ f t := by rw [← ascPochhammer_map f] exact eval_map f t theorem ascPochhammer_eval_comp {R : Type} [CommSemiring R] (n : ℕ) (p : R[X]) [Algebra R S] (x : S) : ((ascPochhammer S n).comp (p.map (algebraMap R S))).eval x = (ascPochhammer S n).eval (p.eval₂ (algebraMap R S) x) := by rw [ascPochhammer_eval₂ (algebraMap R S), ← eval₂_comp', ← ascPochhammer_map (algebraMap R S), ← map_comp, eval_map] end @[simp, norm_cast] theorem ascPochhammer_eval_cast (n k : ℕ) : (((ascPochhammer ℕ n).eval k : ℕ) : S) = ((ascPochhammer S n).eval k : S) := by rw [← ascPochhammer_map (algebraMap ℕ S), eval_map, ← eq_natCast (algebraMap ℕ S), eval₂_at_natCast,Nat.cast_id] #align pochhammer_eval_cast ascPochhammer_eval_cast theorem ascPochhammer_eval_zero {n : ℕ} : (ascPochhammer S n).eval 0 = if n = 0 then 1 else 0 := by cases n · simp · simp [X_mul, Nat.succ_ne_zero, ascPochhammer_succ_left] #align pochhammer_eval_zero ascPochhammer_eval_zero theorem ascPochhammer_zero_eval_zero : (ascPochhammer S 0).eval 0 = 1 := by simp #align pochhammer_zero_eval_zero ascPochhammer_zero_eval_zero @[simp] theorem ascPochhammer_ne_zero_eval_zero {n : ℕ} (h : n ≠ 0) : (ascPochhammer S n).eval 0 = 0 := by simp [ascPochhammer_eval_zero, h] #align pochhammer_ne_zero_eval_zero ascPochhammer_ne_zero_eval_zero theorem ascPochhammer_succ_right (n : ℕ) : ascPochhammer S (n + 1) = ascPochhammer S n (X + (n : S[X])) := by suffices h : ascPochhammer ℕ (n + 1) = ascPochhammer ℕ n * (X + (n : ℕ[X])) by apply_fun Polynomial.map (algebraMap ℕ S) at h simpa only [ascPochhammer_map, Polynomial.map_mul, Polynomial.map_add, map_X, Polynomial.map_natCast] using h induction' n with n ih · simp · conv_lhs => rw [ascPochhammer_succ_left, ih, mul_comp, ← mul_assoc, ← ascPochhammer_succ_left, add_comp, X_comp, natCast_comp, add_assoc, add_comm (1 : ℕ[X]), ← Nat.cast_succ] #align pochhammer_succ_right ascPochhammer_succ_right theorem ascPochhammer_succ_eval {S : Type} [Semiring S] (n : ℕ) (k : S) : (ascPochhammer S (n + 1)).eval k = (ascPochhammer S n).eval k (k + n) := by rw [ascPochhammer_succ_right, mul_add, eval_add, eval_mul_X, ← Nat.cast_comm, ← C_eq_natCast, eval_C_mul, Nat.cast_comm, ← mul_add] #align pochhammer_succ_eval ascPochhammer_succ_eval	Mathlib/RingTheory/Polynomial/Pochhammer.lean	143	152	theorem ascPochhammer_succ_comp_X_add_one (n : ℕ) : (ascPochhammer S (n + 1)).comp (X + 1) = ascPochhammer S (n + 1) + (n + 1) • (ascPochhammer S n).comp (X + 1) := by	suffices (ascPochhammer ℕ (n + 1)).comp (X + 1) = ascPochhammer ℕ (n + 1) + (n + 1) * (ascPochhammer ℕ n).comp (X + 1) by simpa [map_comp] using congr_arg (Polynomial.map (Nat.castRingHom S)) this nth_rw 2 [ascPochhammer_succ_left] rw [← add_mul, ascPochhammer_succ_right ℕ n, mul_comp, mul_comm, add_comp, X_comp, natCast_comp, add_comm, ← add_assoc] ring
import Mathlib.Algebra.BigOperators.Finsupp import Mathlib.Algebra.BigOperators.Finprod import Mathlib.Data.Fintype.BigOperators import Mathlib.LinearAlgebra.Finsupp import Mathlib.LinearAlgebra.LinearIndependent import Mathlib.SetTheory.Cardinal.Cofinality #align_import linear_algebra.basis from "leanprover-community/mathlib"@"13bce9a6b6c44f6b4c91ac1c1d2a816e2533d395" noncomputable section universe u open Function Set Submodule variable {ι : Type} {ι' : Type} {R : Type} {R₂ : Type} {K : Type} variable {M : Type} {M' M'' : Type} {V : Type u} {V' : Type} section Module variable [Semiring R] variable [AddCommMonoid M] [Module R M] [AddCommMonoid M'] [Module R M'] section variable (ι R M) structure Basis where ofRepr :: repr : M ≃ₗ[R] ι →₀ R #align basis Basis #align basis.repr Basis.repr #align basis.of_repr Basis.ofRepr end instance uniqueBasis [Subsingleton R] : Unique (Basis ι R M) := ⟨⟨⟨default⟩⟩, fun ⟨b⟩ => by rw [Subsingleton.elim b]⟩ #align unique_basis uniqueBasis namespace Basis instance : Inhabited (Basis ι R (ι →₀ R)) := ⟨.ofRepr (LinearEquiv.refl _ _)⟩ variable (b b₁ : Basis ι R M) (i : ι) (c : R) (x : M) section repr theorem repr_injective : Injective (repr : Basis ι R M → M ≃ₗ[R] ι →₀ R) := fun f g h => by cases f; cases g; congr #align basis.repr_injective Basis.repr_injective instance instFunLike : FunLike (Basis ι R M) ι M where coe b i := b.repr.symm (Finsupp.single i 1) coe_injective' f g h := repr_injective <\| LinearEquiv.symm_bijective.injective <\| LinearEquiv.toLinearMap_injective <\| by ext; exact congr_fun h _ #align basis.fun_like Basis.instFunLike @[simp] theorem coe_ofRepr (e : M ≃ₗ[R] ι →₀ R) : ⇑(ofRepr e) = fun i => e.symm (Finsupp.single i 1) := rfl #align basis.coe_of_repr Basis.coe_ofRepr protected theorem injective [Nontrivial R] : Injective b := b.repr.symm.injective.comp fun _ _ => (Finsupp.single_left_inj (one_ne_zero : (1 : R) ≠ 0)).mp #align basis.injective Basis.injective theorem repr_symm_single_one : b.repr.symm (Finsupp.single i 1) = b i := rfl #align basis.repr_symm_single_one Basis.repr_symm_single_one theorem repr_symm_single : b.repr.symm (Finsupp.single i c) = c • b i := calc b.repr.symm (Finsupp.single i c) = b.repr.symm (c • Finsupp.single i (1 : R)) := by { rw [Finsupp.smul_single', mul_one] } _ = c • b i := by rw [LinearEquiv.map_smul, repr_symm_single_one] #align basis.repr_symm_single Basis.repr_symm_single @[simp] theorem repr_self : b.repr (b i) = Finsupp.single i 1 := LinearEquiv.apply_symm_apply _ _ #align basis.repr_self Basis.repr_self theorem repr_self_apply (j) [Decidable (i = j)] : b.repr (b i) j = if i = j then 1 else 0 := by rw [repr_self, Finsupp.single_apply] #align basis.repr_self_apply Basis.repr_self_apply @[simp] theorem repr_symm_apply (v) : b.repr.symm v = Finsupp.total ι M R b v := calc b.repr.symm v = b.repr.symm (v.sum Finsupp.single) := by simp _ = v.sum fun i vi => b.repr.symm (Finsupp.single i vi) := map_finsupp_sum .. _ = Finsupp.total ι M R b v := by simp only [repr_symm_single, Finsupp.total_apply] #align basis.repr_symm_apply Basis.repr_symm_apply @[simp] theorem coe_repr_symm : ↑b.repr.symm = Finsupp.total ι M R b := LinearMap.ext fun v => b.repr_symm_apply v #align basis.coe_repr_symm Basis.coe_repr_symm @[simp] theorem repr_total (v) : b.repr (Finsupp.total _ _ _ b v) = v := by rw [← b.coe_repr_symm] exact b.repr.apply_symm_apply v #align basis.repr_total Basis.repr_total @[simp] theorem total_repr : Finsupp.total _ _ _ b (b.repr x) = x := by rw [← b.coe_repr_symm] exact b.repr.symm_apply_apply x #align basis.total_repr Basis.total_repr theorem repr_range : LinearMap.range (b.repr : M →ₗ[R] ι →₀ R) = Finsupp.supported R R univ := by rw [LinearEquiv.range, Finsupp.supported_univ] #align basis.repr_range Basis.repr_range theorem mem_span_repr_support (m : M) : m ∈ span R (b '' (b.repr m).support) := (Finsupp.mem_span_image_iff_total _).2 ⟨b.repr m, by simp [Finsupp.mem_supported_support]⟩ #align basis.mem_span_repr_support Basis.mem_span_repr_support	Mathlib/LinearAlgebra/Basis.lean	186	189	theorem repr_support_subset_of_mem_span (s : Set ι) {m : M} (hm : m ∈ span R (b '' s)) : ↑(b.repr m).support ⊆ s := by	rcases (Finsupp.mem_span_image_iff_total _).1 hm with ⟨l, hl, rfl⟩ rwa [repr_total, ← Finsupp.mem_supported R l]
import Mathlib.Data.Countable.Basic import Mathlib.Data.Fin.VecNotation import Mathlib.Order.Disjointed import Mathlib.MeasureTheory.OuterMeasure.Defs #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 section OuterMeasureClass variable {α ι F : Type} [FunLike F (Set α) ℝ≥0∞] [OuterMeasureClass F α] {μ : F} {s t : Set α} @[simp] theorem measure_empty : μ ∅ = 0 := OuterMeasureClass.measure_empty μ #align measure_theory.measure_empty MeasureTheory.measure_empty @[mono, gcongr] theorem measure_mono (h : s ⊆ t) : μ s ≤ μ t := OuterMeasureClass.measure_mono μ h #align measure_theory.measure_mono MeasureTheory.measure_mono theorem measure_mono_null (h : s ⊆ t) (ht : μ t = 0) : μ s = 0 := eq_bot_mono (measure_mono h) ht #align measure_theory.measure_mono_null MeasureTheory.measure_mono_null theorem measure_pos_of_superset (h : s ⊆ t) (hs : μ s ≠ 0) : 0 < μ t := hs.bot_lt.trans_le (measure_mono h) theorem measure_iUnion_le [Countable ι] (s : ι → Set α) : μ (⋃ i, s i) ≤ ∑' i, μ (s i) := by refine rel_iSup_tsum μ measure_empty (· ≤ ·) (fun t ↦ ?_) _ calc μ (⋃ i, t i) = μ (⋃ i, disjointed t i) := by rw [iUnion_disjointed] _ ≤ ∑' i, μ (disjointed t i) := OuterMeasureClass.measure_iUnion_nat_le _ _ (disjoint_disjointed _) _ ≤ ∑' i, μ (t i) := by gcongr; apply disjointed_subset #align measure_theory.measure_Union_le MeasureTheory.measure_iUnion_le theorem measure_biUnion_le {I : Set ι} (μ : F) (hI : I.Countable) (s : ι → Set α) : μ (⋃ i ∈ I, s i) ≤ ∑' i : I, μ (s i) := by have := hI.to_subtype rw [biUnion_eq_iUnion] apply measure_iUnion_le #align measure_theory.measure_bUnion_le MeasureTheory.measure_biUnion_le theorem measure_biUnion_finset_le (I : Finset ι) (s : ι → Set α) : μ (⋃ i ∈ I, s i) ≤ ∑ i ∈ I, μ (s i) := (measure_biUnion_le μ I.countable_toSet s).trans_eq <\| I.tsum_subtype (μ <\| s ·) #align measure_theory.measure_bUnion_finset_le MeasureTheory.measure_biUnion_finset_le theorem measure_iUnion_fintype_le [Fintype ι] (μ : F) (s : ι → Set α) : μ (⋃ i, s i) ≤ ∑ i, μ (s i) := by simpa using measure_biUnion_finset_le Finset.univ s #align measure_theory.measure_Union_fintype_le MeasureTheory.measure_iUnion_fintype_le theorem measure_union_le (s t : Set α) : μ (s ∪ t) ≤ μ s + μ t := by simpa [union_eq_iUnion] using measure_iUnion_fintype_le μ (cond · s t) #align measure_theory.measure_union_le MeasureTheory.measure_union_le theorem measure_le_inter_add_diff (μ : F) (s t : Set α) : μ s ≤ μ (s ∩ t) + μ (s \ t) := by simpa using measure_union_le (s ∩ t) (s \ t) theorem measure_diff_null (ht : μ t = 0) : μ (s \ t) = μ s := (measure_mono diff_subset).antisymm <\| calc μ s ≤ μ (s ∩ t) + μ (s \ t) := measure_le_inter_add_diff _ _ _ _ ≤ μ t + μ (s \ t) := by gcongr; apply inter_subset_right _ = μ (s \ t) := by simp [ht] #align measure_theory.measure_diff_null MeasureTheory.measure_diff_null theorem measure_biUnion_null_iff {I : Set ι} (hI : I.Countable) {s : ι → Set α} : μ (⋃ i ∈ I, s i) = 0 ↔ ∀ i ∈ I, μ (s i) = 0 := by refine ⟨fun h i hi ↦ measure_mono_null (subset_biUnion_of_mem hi) h, fun h ↦ ?_⟩ have _ := hI.to_subtype simpa [h] using measure_iUnion_le (μ := μ) fun x : I ↦ s x #align measure_theory.measure_bUnion_null_iff MeasureTheory.measure_biUnion_null_iff theorem measure_sUnion_null_iff {S : Set (Set α)} (hS : S.Countable) : μ (⋃₀ S) = 0 ↔ ∀ s ∈ S, μ s = 0 := by rw [sUnion_eq_biUnion, measure_biUnion_null_iff hS] #align measure_theory.measure_sUnion_null_iff MeasureTheory.measure_sUnion_null_iff @[simp] theorem measure_iUnion_null_iff {ι : Sort} [Countable ι] {s : ι → Set α} : μ (⋃ i, s i) = 0 ↔ ∀ i, μ (s i) = 0 := by rw [← sUnion_range, measure_sUnion_null_iff (countable_range s), forall_mem_range] #align measure_theory.measure_Union_null_iff MeasureTheory.measure_iUnion_null_iff alias ⟨_, measure_iUnion_null⟩ := measure_iUnion_null_iff #align measure_theory.measure_Union_null MeasureTheory.measure_iUnion_null @[simp]	Mathlib/MeasureTheory/OuterMeasure/Basic.lean	125	126	theorem measure_union_null_iff : μ (s ∪ t) = 0 ↔ μ s = 0 ∧ μ t = 0 := by	simp [union_eq_iUnion, and_comm]
import Mathlib.Algebra.Algebra.Defs import Mathlib.Algebra.Polynomial.FieldDivision import Mathlib.FieldTheory.Minpoly.Basic import Mathlib.RingTheory.Adjoin.Basic import Mathlib.RingTheory.FinitePresentation import Mathlib.RingTheory.FiniteType import Mathlib.RingTheory.PowerBasis import Mathlib.RingTheory.PrincipalIdealDomain import Mathlib.RingTheory.QuotientNoetherian #align_import ring_theory.adjoin_root from "leanprover-community/mathlib"@"5c4b3d41a84bd2a1d79c7d9265e58a891e71be89" noncomputable section open scoped Classical open Polynomial universe u v w variable {R : Type u} {S : Type v} {K : Type w} open Polynomial Ideal def AdjoinRoot [CommRing R] (f : R[X]) : Type u := Polynomial R ⧸ (span {f} : Ideal R[X]) #align adjoin_root AdjoinRoot namespace AdjoinRoot section CommRing variable [CommRing R] (f : R[X]) instance instCommRing : CommRing (AdjoinRoot f) := Ideal.Quotient.commRing _ #align adjoin_root.comm_ring AdjoinRoot.instCommRing instance : Inhabited (AdjoinRoot f) := ⟨0⟩ instance : DecidableEq (AdjoinRoot f) := Classical.decEq _ protected theorem nontrivial [IsDomain R] (h : degree f ≠ 0) : Nontrivial (AdjoinRoot f) := Ideal.Quotient.nontrivial (by simp_rw [Ne, span_singleton_eq_top, Polynomial.isUnit_iff, not_exists, not_and] rintro x hx rfl exact h (degree_C hx.ne_zero)) #align adjoin_root.nontrivial AdjoinRoot.nontrivial def mk : R[X] →+* AdjoinRoot f := Ideal.Quotient.mk _ #align adjoin_root.mk AdjoinRoot.mk @[elab_as_elim] theorem induction_on {C : AdjoinRoot f → Prop} (x : AdjoinRoot f) (ih : ∀ p : R[X], C (mk f p)) : C x := Quotient.inductionOn' x ih #align adjoin_root.induction_on AdjoinRoot.induction_on def of : R →+* AdjoinRoot f := (mk f).comp C #align adjoin_root.of AdjoinRoot.of instance instSMulAdjoinRoot [DistribSMul S R] [IsScalarTower S R R] : SMul S (AdjoinRoot f) := Submodule.Quotient.instSMul' _ instance [DistribSMul S R] [IsScalarTower S R R] : DistribSMul S (AdjoinRoot f) := Submodule.Quotient.distribSMul' _ @[simp] theorem smul_mk [DistribSMul S R] [IsScalarTower S R R] (a : S) (x : R[X]) : a • mk f x = mk f (a • x) := rfl #align adjoin_root.smul_mk AdjoinRoot.smul_mk theorem smul_of [DistribSMul S R] [IsScalarTower S R R] (a : S) (x : R) : a • of f x = of f (a • x) := by rw [of, RingHom.comp_apply, RingHom.comp_apply, smul_mk, smul_C] #align adjoin_root.smul_of AdjoinRoot.smul_of instance (R₁ R₂ : Type) [SMul R₁ R₂] [DistribSMul R₁ R] [DistribSMul R₂ R] [IsScalarTower R₁ R R] [IsScalarTower R₂ R R] [IsScalarTower R₁ R₂ R] (f : R[X]) : IsScalarTower R₁ R₂ (AdjoinRoot f) := Submodule.Quotient.isScalarTower _ _ instance (R₁ R₂ : Type) [DistribSMul R₁ R] [DistribSMul R₂ R] [IsScalarTower R₁ R R] [IsScalarTower R₂ R R] [SMulCommClass R₁ R₂ R] (f : R[X]) : SMulCommClass R₁ R₂ (AdjoinRoot f) := Submodule.Quotient.smulCommClass _ _ instance isScalarTower_right [DistribSMul S R] [IsScalarTower S R R] : IsScalarTower S (AdjoinRoot f) (AdjoinRoot f) := Ideal.Quotient.isScalarTower_right #align adjoin_root.is_scalar_tower_right AdjoinRoot.isScalarTower_right instance [Monoid S] [DistribMulAction S R] [IsScalarTower S R R] (f : R[X]) : DistribMulAction S (AdjoinRoot f) := Submodule.Quotient.distribMulAction' _ instance [CommSemiring S] [Algebra S R] : Algebra S (AdjoinRoot f) := Ideal.Quotient.algebra S @[simp] theorem algebraMap_eq : algebraMap R (AdjoinRoot f) = of f := rfl #align adjoin_root.algebra_map_eq AdjoinRoot.algebraMap_eq variable (S) theorem algebraMap_eq' [CommSemiring S] [Algebra S R] : algebraMap S (AdjoinRoot f) = (of f).comp (algebraMap S R) := rfl #align adjoin_root.algebra_map_eq' AdjoinRoot.algebraMap_eq' variable {S} theorem finiteType : Algebra.FiniteType R (AdjoinRoot f) := (Algebra.FiniteType.polynomial R).of_surjective _ (Ideal.Quotient.mkₐ_surjective R _) #align adjoin_root.finite_type AdjoinRoot.finiteType theorem finitePresentation : Algebra.FinitePresentation R (AdjoinRoot f) := (Algebra.FinitePresentation.polynomial R).quotient (Submodule.fg_span_singleton f) #align adjoin_root.finite_presentation AdjoinRoot.finitePresentation def root : AdjoinRoot f := mk f X #align adjoin_root.root AdjoinRoot.root variable {f} instance hasCoeT : CoeTC R (AdjoinRoot f) := ⟨of f⟩ #align adjoin_root.has_coe_t AdjoinRoot.hasCoeT @[ext] theorem algHom_ext [Semiring S] [Algebra R S] {g₁ g₂ : AdjoinRoot f →ₐ[R] S} (h : g₁ (root f) = g₂ (root f)) : g₁ = g₂ := Ideal.Quotient.algHom_ext R <\| Polynomial.algHom_ext h #align adjoin_root.alg_hom_ext AdjoinRoot.algHom_ext @[simp] theorem mk_eq_mk {g h : R[X]} : mk f g = mk f h ↔ f ∣ g - h := Ideal.Quotient.eq.trans Ideal.mem_span_singleton #align adjoin_root.mk_eq_mk AdjoinRoot.mk_eq_mk @[simp] theorem mk_eq_zero {g : R[X]} : mk f g = 0 ↔ f ∣ g := mk_eq_mk.trans <\| by rw [sub_zero] #align adjoin_root.mk_eq_zero AdjoinRoot.mk_eq_zero @[simp] theorem mk_self : mk f f = 0 := Quotient.sound' <\| QuotientAddGroup.leftRel_apply.mpr (mem_span_singleton.2 <\| by simp) #align adjoin_root.mk_self AdjoinRoot.mk_self @[simp] theorem mk_C (x : R) : mk f (C x) = x := rfl set_option linter.uppercaseLean3 false in #align adjoin_root.mk_C AdjoinRoot.mk_C @[simp] theorem mk_X : mk f X = root f := rfl set_option linter.uppercaseLean3 false in #align adjoin_root.mk_X AdjoinRoot.mk_X theorem mk_ne_zero_of_degree_lt (hf : Monic f) {g : R[X]} (h0 : g ≠ 0) (hd : degree g < degree f) : mk f g ≠ 0 := mk_eq_zero.not.2 <\| hf.not_dvd_of_degree_lt h0 hd #align adjoin_root.mk_ne_zero_of_degree_lt AdjoinRoot.mk_ne_zero_of_degree_lt theorem mk_ne_zero_of_natDegree_lt (hf : Monic f) {g : R[X]} (h0 : g ≠ 0) (hd : natDegree g < natDegree f) : mk f g ≠ 0 := mk_eq_zero.not.2 <\| hf.not_dvd_of_natDegree_lt h0 hd #align adjoin_root.mk_ne_zero_of_nat_degree_lt AdjoinRoot.mk_ne_zero_of_natDegree_lt @[simp] theorem aeval_eq (p : R[X]) : aeval (root f) p = mk f p := Polynomial.induction_on p (fun x => by rw [aeval_C] rfl) (fun p q ihp ihq => by rw [AlgHom.map_add, RingHom.map_add, ihp, ihq]) fun n x _ => by rw [AlgHom.map_mul, aeval_C, AlgHom.map_pow, aeval_X, RingHom.map_mul, mk_C, RingHom.map_pow, mk_X] rfl #align adjoin_root.aeval_eq AdjoinRoot.aeval_eq -- Porting note: the following proof was partly in term-mode, but I was not able to fix it. theorem adjoinRoot_eq_top : Algebra.adjoin R ({root f} : Set (AdjoinRoot f)) = ⊤ := by refine Algebra.eq_top_iff.2 fun x => ?_ induction x using AdjoinRoot.induction_on with \| ih p => exact (Algebra.adjoin_singleton_eq_range_aeval R (root f)).symm ▸ ⟨p, aeval_eq p⟩ #align adjoin_root.adjoin_root_eq_top AdjoinRoot.adjoinRoot_eq_top @[simp]	Mathlib/RingTheory/AdjoinRoot.lean	244	245	theorem eval₂_root (f : R[X]) : f.eval₂ (of f) (root f) = 0 := by	rw [← algebraMap_eq, ← aeval_def, aeval_eq, mk_self]
import Mathlib.Order.Filter.SmallSets import Mathlib.Tactic.Monotonicity import Mathlib.Topology.Compactness.Compact import Mathlib.Topology.NhdsSet import Mathlib.Algebra.Group.Defs #align_import topology.uniform_space.basic from "leanprover-community/mathlib"@"195fcd60ff2bfe392543bceb0ec2adcdb472db4c" open Set Filter Topology universe u v ua ub uc ud variable {α : Type ua} {β : Type ub} {γ : Type uc} {δ : Type ud} {ι : Sort} def idRel {α : Type} := { p : α × α \| p.1 = p.2 } #align id_rel idRel @[simp] theorem mem_idRel {a b : α} : (a, b) ∈ @idRel α ↔ a = b := Iff.rfl #align mem_id_rel mem_idRel @[simp] theorem idRel_subset {s : Set (α × α)} : idRel ⊆ s ↔ ∀ a, (a, a) ∈ s := by simp [subset_def] #align id_rel_subset idRel_subset def compRel (r₁ r₂ : Set (α × α)) := { p : α × α \| ∃ z : α, (p.1, z) ∈ r₁ ∧ (z, p.2) ∈ r₂ } #align comp_rel compRel @[inherit_doc] scoped[Uniformity] infixl:62 " ○ " => compRel open Uniformity @[simp] theorem mem_compRel {α : Type u} {r₁ r₂ : Set (α × α)} {x y : α} : (x, y) ∈ r₁ ○ r₂ ↔ ∃ z, (x, z) ∈ r₁ ∧ (z, y) ∈ r₂ := Iff.rfl #align mem_comp_rel mem_compRel @[simp] theorem swap_idRel : Prod.swap '' idRel = @idRel α := Set.ext fun ⟨a, b⟩ => by simpa [image_swap_eq_preimage_swap] using eq_comm #align swap_id_rel swap_idRel theorem Monotone.compRel [Preorder β] {f g : β → Set (α × α)} (hf : Monotone f) (hg : Monotone g) : Monotone fun x => f x ○ g x := fun _ _ h _ ⟨z, h₁, h₂⟩ => ⟨z, hf h h₁, hg h h₂⟩ #align monotone.comp_rel Monotone.compRel @[mono] theorem compRel_mono {f g h k : Set (α × α)} (h₁ : f ⊆ h) (h₂ : g ⊆ k) : f ○ g ⊆ h ○ k := fun _ ⟨z, h, h'⟩ => ⟨z, h₁ h, h₂ h'⟩ #align comp_rel_mono compRel_mono theorem prod_mk_mem_compRel {a b c : α} {s t : Set (α × α)} (h₁ : (a, c) ∈ s) (h₂ : (c, b) ∈ t) : (a, b) ∈ s ○ t := ⟨c, h₁, h₂⟩ #align prod_mk_mem_comp_rel prod_mk_mem_compRel @[simp] theorem id_compRel {r : Set (α × α)} : idRel ○ r = r := Set.ext fun ⟨a, b⟩ => by simp #align id_comp_rel id_compRel theorem compRel_assoc {r s t : Set (α × α)} : r ○ s ○ t = r ○ (s ○ t) := by ext ⟨a, b⟩; simp only [mem_compRel]; tauto #align comp_rel_assoc compRel_assoc theorem left_subset_compRel {s t : Set (α × α)} (h : idRel ⊆ t) : s ⊆ s ○ t := fun ⟨_x, y⟩ xy_in => ⟨y, xy_in, h <\| rfl⟩ #align left_subset_comp_rel left_subset_compRel theorem right_subset_compRel {s t : Set (α × α)} (h : idRel ⊆ s) : t ⊆ s ○ t := fun ⟨x, _y⟩ xy_in => ⟨x, h <\| rfl, xy_in⟩ #align right_subset_comp_rel right_subset_compRel theorem subset_comp_self {s : Set (α × α)} (h : idRel ⊆ s) : s ⊆ s ○ s := left_subset_compRel h #align subset_comp_self subset_comp_self theorem subset_iterate_compRel {s t : Set (α × α)} (h : idRel ⊆ s) (n : ℕ) : t ⊆ (s ○ ·)^[n] t := by induction' n with n ihn generalizing t exacts [Subset.rfl, (right_subset_compRel h).trans ihn] #align subset_iterate_comp_rel subset_iterate_compRel def SymmetricRel (V : Set (α × α)) : Prop := Prod.swap ⁻¹' V = V #align symmetric_rel SymmetricRel def symmetrizeRel (V : Set (α × α)) : Set (α × α) := V ∩ Prod.swap ⁻¹' V #align symmetrize_rel symmetrizeRel theorem symmetric_symmetrizeRel (V : Set (α × α)) : SymmetricRel (symmetrizeRel V) := by simp [SymmetricRel, symmetrizeRel, preimage_inter, inter_comm, ← preimage_comp] #align symmetric_symmetrize_rel symmetric_symmetrizeRel theorem symmetrizeRel_subset_self (V : Set (α × α)) : symmetrizeRel V ⊆ V := sep_subset _ _ #align symmetrize_rel_subset_self symmetrizeRel_subset_self @[mono] theorem symmetrize_mono {V W : Set (α × α)} (h : V ⊆ W) : symmetrizeRel V ⊆ symmetrizeRel W := inter_subset_inter h <\| preimage_mono h #align symmetrize_mono symmetrize_mono theorem SymmetricRel.mk_mem_comm {V : Set (α × α)} (hV : SymmetricRel V) {x y : α} : (x, y) ∈ V ↔ (y, x) ∈ V := Set.ext_iff.1 hV (y, x) #align symmetric_rel.mk_mem_comm SymmetricRel.mk_mem_comm theorem SymmetricRel.eq {U : Set (α × α)} (hU : SymmetricRel U) : Prod.swap ⁻¹' U = U := hU #align symmetric_rel.eq SymmetricRel.eq theorem SymmetricRel.inter {U V : Set (α × α)} (hU : SymmetricRel U) (hV : SymmetricRel V) : SymmetricRel (U ∩ V) := by rw [SymmetricRel, preimage_inter, hU.eq, hV.eq] #align symmetric_rel.inter SymmetricRel.inter structure UniformSpace.Core (α : Type u) where uniformity : Filter (α × α) refl : 𝓟 idRel ≤ uniformity symm : Tendsto Prod.swap uniformity uniformity comp : (uniformity.lift' fun s => s ○ s) ≤ uniformity #align uniform_space.core UniformSpace.Core protected theorem UniformSpace.Core.comp_mem_uniformity_sets {c : Core α} {s : Set (α × α)} (hs : s ∈ c.uniformity) : ∃ t ∈ c.uniformity, t ○ t ⊆ s := (mem_lift'_sets <\| monotone_id.compRel monotone_id).mp <\| c.comp hs def UniformSpace.Core.mk' {α : Type u} (U : Filter (α × α)) (refl : ∀ r ∈ U, ∀ (x), (x, x) ∈ r) (symm : ∀ r ∈ U, Prod.swap ⁻¹' r ∈ U) (comp : ∀ r ∈ U, ∃ t ∈ U, t ○ t ⊆ r) : UniformSpace.Core α := ⟨U, fun _r ru => idRel_subset.2 (refl _ ru), symm, fun _r ru => let ⟨_s, hs, hsr⟩ := comp _ ru mem_of_superset (mem_lift' hs) hsr⟩ #align uniform_space.core.mk' UniformSpace.Core.mk' def UniformSpace.Core.mkOfBasis {α : Type u} (B : FilterBasis (α × α)) (refl : ∀ r ∈ B, ∀ (x), (x, x) ∈ r) (symm : ∀ r ∈ B, ∃ t ∈ B, t ⊆ Prod.swap ⁻¹' r) (comp : ∀ r ∈ B, ∃ t ∈ B, t ○ t ⊆ r) : UniformSpace.Core α where uniformity := B.filter refl := B.hasBasis.ge_iff.mpr fun _r ru => idRel_subset.2 <\| refl _ ru symm := (B.hasBasis.tendsto_iff B.hasBasis).mpr symm comp := (HasBasis.le_basis_iff (B.hasBasis.lift' (monotone_id.compRel monotone_id)) B.hasBasis).2 comp #align uniform_space.core.mk_of_basis UniformSpace.Core.mkOfBasis def UniformSpace.Core.toTopologicalSpace {α : Type u} (u : UniformSpace.Core α) : TopologicalSpace α := .mkOfNhds fun x ↦ .comap (Prod.mk x) u.uniformity #align uniform_space.core.to_topological_space UniformSpace.Core.toTopologicalSpace theorem UniformSpace.Core.ext : ∀ {u₁ u₂ : UniformSpace.Core α}, u₁.uniformity = u₂.uniformity → u₁ = u₂ \| ⟨_, _, _, _⟩, ⟨_, _, _, _⟩, rfl => rfl #align uniform_space.core_eq UniformSpace.Core.ext theorem UniformSpace.Core.nhds_toTopologicalSpace {α : Type u} (u : Core α) (x : α) : @nhds α u.toTopologicalSpace x = comap (Prod.mk x) u.uniformity := by apply TopologicalSpace.nhds_mkOfNhds_of_hasBasis (fun _ ↦ (basis_sets _).comap _) · exact fun a U hU ↦ u.refl hU rfl · intro a U hU rcases u.comp_mem_uniformity_sets hU with ⟨V, hV, hVU⟩ filter_upwards [preimage_mem_comap hV] with b hb filter_upwards [preimage_mem_comap hV] with c hc exact hVU ⟨b, hb, hc⟩ -- the topological structure is embedded in the uniform structure -- to avoid instance diamond issues. See Note [forgetful inheritance]. class UniformSpace (α : Type u) extends TopologicalSpace α where protected uniformity : Filter (α × α) protected symm : Tendsto Prod.swap uniformity uniformity protected comp : (uniformity.lift' fun s => s ○ s) ≤ uniformity protected nhds_eq_comap_uniformity (x : α) : 𝓝 x = comap (Prod.mk x) uniformity #align uniform_space UniformSpace #noalign uniform_space.mk' -- Can't be a `match_pattern`, so not useful anymore def uniformity (α : Type u) [UniformSpace α] : Filter (α × α) := @UniformSpace.uniformity α _ #align uniformity uniformity scoped[Uniformity] notation "𝓤[" u "]" => @uniformity _ u @[inherit_doc] -- Porting note (#11215): TODO: should we drop the `uniformity` def? scoped[Uniformity] notation "𝓤" => uniformity abbrev UniformSpace.ofCoreEq {α : Type u} (u : UniformSpace.Core α) (t : TopologicalSpace α) (h : t = u.toTopologicalSpace) : UniformSpace α where __ := u toTopologicalSpace := t nhds_eq_comap_uniformity x := by rw [h, u.nhds_toTopologicalSpace] #align uniform_space.of_core_eq UniformSpace.ofCoreEq abbrev UniformSpace.ofCore {α : Type u} (u : UniformSpace.Core α) : UniformSpace α := .ofCoreEq u _ rfl #align uniform_space.of_core UniformSpace.ofCore abbrev UniformSpace.toCore (u : UniformSpace α) : UniformSpace.Core α where __ := u refl := by rintro U hU ⟨x, y⟩ (rfl : x = y) have : Prod.mk x ⁻¹' U ∈ 𝓝 x := by rw [UniformSpace.nhds_eq_comap_uniformity] exact preimage_mem_comap hU convert mem_of_mem_nhds this theorem UniformSpace.toCore_toTopologicalSpace (u : UniformSpace α) : u.toCore.toTopologicalSpace = u.toTopologicalSpace := TopologicalSpace.ext_nhds fun a ↦ by rw [u.nhds_eq_comap_uniformity, u.toCore.nhds_toTopologicalSpace] #align uniform_space.to_core_to_topological_space UniformSpace.toCore_toTopologicalSpace @[deprecated UniformSpace.mk (since := "2024-03-20")] def UniformSpace.ofNhdsEqComap (u : UniformSpace.Core α) (_t : TopologicalSpace α) (h : ∀ x, 𝓝 x = u.uniformity.comap (Prod.mk x)) : UniformSpace α where __ := u nhds_eq_comap_uniformity := h @[ext] protected theorem UniformSpace.ext {u₁ u₂ : UniformSpace α} (h : 𝓤[u₁] = 𝓤[u₂]) : u₁ = u₂ := by have : u₁.toTopologicalSpace = u₂.toTopologicalSpace := TopologicalSpace.ext_nhds fun x ↦ by rw [u₁.nhds_eq_comap_uniformity, u₂.nhds_eq_comap_uniformity] exact congr_arg (comap _) h cases u₁; cases u₂; congr #align uniform_space_eq UniformSpace.ext protected theorem UniformSpace.ext_iff {u₁ u₂ : UniformSpace α} : u₁ = u₂ ↔ ∀ s, s ∈ 𝓤[u₁] ↔ s ∈ 𝓤[u₂] := ⟨fun h _ => h ▸ Iff.rfl, fun h => by ext; exact h _⟩ theorem UniformSpace.ofCoreEq_toCore (u : UniformSpace α) (t : TopologicalSpace α) (h : t = u.toCore.toTopologicalSpace) : .ofCoreEq u.toCore t h = u := UniformSpace.ext rfl #align uniform_space.of_core_eq_to_core UniformSpace.ofCoreEq_toCore abbrev UniformSpace.replaceTopology {α : Type} [i : TopologicalSpace α] (u : UniformSpace α) (h : i = u.toTopologicalSpace) : UniformSpace α where __ := u toTopologicalSpace := i nhds_eq_comap_uniformity x := by rw [h, u.nhds_eq_comap_uniformity] #align uniform_space.replace_topology UniformSpace.replaceTopology theorem UniformSpace.replaceTopology_eq {α : Type} [i : TopologicalSpace α] (u : UniformSpace α) (h : i = u.toTopologicalSpace) : u.replaceTopology h = u := UniformSpace.ext rfl #align uniform_space.replace_topology_eq UniformSpace.replaceTopology_eq -- Porting note: rfc: use `UniformSpace.Core.mkOfBasis`? This will change defeq here and there def UniformSpace.ofFun {α : Type u} {β : Type v} [OrderedAddCommMonoid β] (d : α → α → β) (refl : ∀ x, d x x = 0) (symm : ∀ x y, d x y = d y x) (triangle : ∀ x y z, d x z ≤ d x y + d y z) (half : ∀ ε > (0 : β), ∃ δ > (0 : β), ∀ x < δ, ∀ y < δ, x + y < ε) : UniformSpace α := .ofCore { uniformity := ⨅ r > 0, 𝓟 { x \| d x.1 x.2 < r } refl := le_iInf₂ fun r hr => principal_mono.2 <\| idRel_subset.2 fun x => by simpa [refl] symm := tendsto_iInf_iInf fun r => tendsto_iInf_iInf fun _ => tendsto_principal_principal.2 fun x hx => by rwa [mem_setOf, symm] comp := le_iInf₂ fun r hr => let ⟨δ, h0, hδr⟩ := half r hr; le_principal_iff.2 <\| mem_of_superset (mem_lift' <\| mem_iInf_of_mem δ <\| mem_iInf_of_mem h0 <\| mem_principal_self _) fun (x, z) ⟨y, h₁, h₂⟩ => (triangle _ _ _).trans_lt (hδr _ h₁ _ h₂) } #align uniform_space.of_fun UniformSpace.ofFun theorem UniformSpace.hasBasis_ofFun {α : Type u} {β : Type v} [LinearOrderedAddCommMonoid β] (h₀ : ∃ x : β, 0 < x) (d : α → α → β) (refl : ∀ x, d x x = 0) (symm : ∀ x y, d x y = d y x) (triangle : ∀ x y z, d x z ≤ d x y + d y z) (half : ∀ ε > (0 : β), ∃ δ > (0 : β), ∀ x < δ, ∀ y < δ, x + y < ε) : 𝓤[.ofFun d refl symm triangle half].HasBasis ((0 : β) < ·) (fun ε => { x \| d x.1 x.2 < ε }) := hasBasis_biInf_principal' (fun ε₁ h₁ ε₂ h₂ => ⟨min ε₁ ε₂, lt_min h₁ h₂, fun _x hx => lt_of_lt_of_le hx (min_le_left _ _), fun _x hx => lt_of_lt_of_le hx (min_le_right _ _)⟩) h₀ #align uniform_space.has_basis_of_fun UniformSpace.hasBasis_ofFun section UniformSpace variable [UniformSpace α] theorem nhds_eq_comap_uniformity {x : α} : 𝓝 x = (𝓤 α).comap (Prod.mk x) := UniformSpace.nhds_eq_comap_uniformity x #align nhds_eq_comap_uniformity nhds_eq_comap_uniformity theorem isOpen_uniformity {s : Set α} : IsOpen s ↔ ∀ x ∈ s, { p : α × α \| p.1 = x → p.2 ∈ s } ∈ 𝓤 α := by simp only [isOpen_iff_mem_nhds, nhds_eq_comap_uniformity, mem_comap_prod_mk] #align is_open_uniformity isOpen_uniformity theorem refl_le_uniformity : 𝓟 idRel ≤ 𝓤 α := (@UniformSpace.toCore α _).refl #align refl_le_uniformity refl_le_uniformity instance uniformity.neBot [Nonempty α] : NeBot (𝓤 α) := diagonal_nonempty.principal_neBot.mono refl_le_uniformity #align uniformity.ne_bot uniformity.neBot theorem refl_mem_uniformity {x : α} {s : Set (α × α)} (h : s ∈ 𝓤 α) : (x, x) ∈ s := refl_le_uniformity h rfl #align refl_mem_uniformity refl_mem_uniformity theorem mem_uniformity_of_eq {x y : α} {s : Set (α × α)} (h : s ∈ 𝓤 α) (hx : x = y) : (x, y) ∈ s := refl_le_uniformity h hx #align mem_uniformity_of_eq mem_uniformity_of_eq theorem symm_le_uniformity : map (@Prod.swap α α) (𝓤 _) ≤ 𝓤 _ := UniformSpace.symm #align symm_le_uniformity symm_le_uniformity theorem comp_le_uniformity : ((𝓤 α).lift' fun s : Set (α × α) => s ○ s) ≤ 𝓤 α := UniformSpace.comp #align comp_le_uniformity comp_le_uniformity theorem lift'_comp_uniformity : ((𝓤 α).lift' fun s : Set (α × α) => s ○ s) = 𝓤 α := comp_le_uniformity.antisymm <\| le_lift'.2 fun _s hs ↦ mem_of_superset hs <\| subset_comp_self <\| idRel_subset.2 fun _ ↦ refl_mem_uniformity hs theorem tendsto_swap_uniformity : Tendsto (@Prod.swap α α) (𝓤 α) (𝓤 α) := symm_le_uniformity #align tendsto_swap_uniformity tendsto_swap_uniformity theorem comp_mem_uniformity_sets {s : Set (α × α)} (hs : s ∈ 𝓤 α) : ∃ t ∈ 𝓤 α, t ○ t ⊆ s := (mem_lift'_sets <\| monotone_id.compRel monotone_id).mp <\| comp_le_uniformity hs #align comp_mem_uniformity_sets comp_mem_uniformity_sets theorem eventually_uniformity_iterate_comp_subset {s : Set (α × α)} (hs : s ∈ 𝓤 α) (n : ℕ) : ∀ᶠ t in (𝓤 α).smallSets, (t ○ ·)^[n] t ⊆ s := by suffices ∀ᶠ t in (𝓤 α).smallSets, t ⊆ s ∧ (t ○ ·)^[n] t ⊆ s from (eventually_and.1 this).2 induction' n with n ihn generalizing s · simpa rcases comp_mem_uniformity_sets hs with ⟨t, htU, hts⟩ refine (ihn htU).mono fun U hU => ?_ rw [Function.iterate_succ_apply'] exact ⟨hU.1.trans <\| (subset_comp_self <\| refl_le_uniformity htU).trans hts, (compRel_mono hU.1 hU.2).trans hts⟩ #align eventually_uniformity_iterate_comp_subset eventually_uniformity_iterate_comp_subset theorem eventually_uniformity_comp_subset {s : Set (α × α)} (hs : s ∈ 𝓤 α) : ∀ᶠ t in (𝓤 α).smallSets, t ○ t ⊆ s := eventually_uniformity_iterate_comp_subset hs 1 #align eventually_uniformity_comp_subset eventually_uniformity_comp_subset theorem Filter.Tendsto.uniformity_trans {l : Filter β} {f₁ f₂ f₃ : β → α} (h₁₂ : Tendsto (fun x => (f₁ x, f₂ x)) l (𝓤 α)) (h₂₃ : Tendsto (fun x => (f₂ x, f₃ x)) l (𝓤 α)) : Tendsto (fun x => (f₁ x, f₃ x)) l (𝓤 α) := by refine le_trans (le_lift'.2 fun s hs => mem_map.2 ?_) comp_le_uniformity filter_upwards [mem_map.1 (h₁₂ hs), mem_map.1 (h₂₃ hs)] with x hx₁₂ hx₂₃ using ⟨_, hx₁₂, hx₂₃⟩ #align filter.tendsto.uniformity_trans Filter.Tendsto.uniformity_trans theorem Filter.Tendsto.uniformity_symm {l : Filter β} {f : β → α × α} (h : Tendsto f l (𝓤 α)) : Tendsto (fun x => ((f x).2, (f x).1)) l (𝓤 α) := tendsto_swap_uniformity.comp h #align filter.tendsto.uniformity_symm Filter.Tendsto.uniformity_symm theorem tendsto_diag_uniformity (f : β → α) (l : Filter β) : Tendsto (fun x => (f x, f x)) l (𝓤 α) := fun _s hs => mem_map.2 <\| univ_mem' fun _ => refl_mem_uniformity hs #align tendsto_diag_uniformity tendsto_diag_uniformity theorem tendsto_const_uniformity {a : α} {f : Filter β} : Tendsto (fun _ => (a, a)) f (𝓤 α) := tendsto_diag_uniformity (fun _ => a) f #align tendsto_const_uniformity tendsto_const_uniformity theorem symm_of_uniformity {s : Set (α × α)} (hs : s ∈ 𝓤 α) : ∃ t ∈ 𝓤 α, (∀ a b, (a, b) ∈ t → (b, a) ∈ t) ∧ t ⊆ s := have : preimage Prod.swap s ∈ 𝓤 α := symm_le_uniformity hs ⟨s ∩ preimage Prod.swap s, inter_mem hs this, fun _ _ ⟨h₁, h₂⟩ => ⟨h₂, h₁⟩, inter_subset_left⟩ #align symm_of_uniformity symm_of_uniformity theorem comp_symm_of_uniformity {s : Set (α × α)} (hs : s ∈ 𝓤 α) : ∃ t ∈ 𝓤 α, (∀ {a b}, (a, b) ∈ t → (b, a) ∈ t) ∧ t ○ t ⊆ s := let ⟨_t, ht₁, ht₂⟩ := comp_mem_uniformity_sets hs let ⟨t', ht', ht'₁, ht'₂⟩ := symm_of_uniformity ht₁ ⟨t', ht', ht'₁ _ _, Subset.trans (monotone_id.compRel monotone_id ht'₂) ht₂⟩ #align comp_symm_of_uniformity comp_symm_of_uniformity	Mathlib/Topology/UniformSpace/Basic.lean	548	549	theorem uniformity_le_symm : 𝓤 α ≤ @Prod.swap α α <$> 𝓤 α := by	rw [map_swap_eq_comap_swap]; exact tendsto_swap_uniformity.le_comap
import Mathlib.Analysis.Convex.Normed import Mathlib.Analysis.Convex.Strict import Mathlib.Analysis.Normed.Order.Basic import Mathlib.Analysis.NormedSpace.AddTorsor import Mathlib.Analysis.NormedSpace.Pointwise import Mathlib.Analysis.NormedSpace.Ray #align_import analysis.convex.strict_convex_space from "leanprover-community/mathlib"@"a63928c34ec358b5edcda2bf7513c50052a5230f" open Convex Pointwise Set Metric class StrictConvexSpace (𝕜 E : Type) [NormedLinearOrderedField 𝕜] [NormedAddCommGroup E] [NormedSpace 𝕜 E] : Prop where strictConvex_closedBall : ∀ r : ℝ, 0 < r → StrictConvex 𝕜 (closedBall (0 : E) r) #align strict_convex_space StrictConvexSpace variable (𝕜 : Type) {E : Type*} [NormedLinearOrderedField 𝕜] [NormedAddCommGroup E] [NormedSpace 𝕜 E] theorem strictConvex_closedBall [StrictConvexSpace 𝕜 E] (x : E) (r : ℝ) : StrictConvex 𝕜 (closedBall x r) := by rcases le_or_lt r 0 with hr \| hr · exact (subsingleton_closedBall x hr).strictConvex rw [← vadd_closedBall_zero] exact (StrictConvexSpace.strictConvex_closedBall r hr).vadd _ #align strict_convex_closed_ball strictConvex_closedBall variable [NormedSpace ℝ E] theorem StrictConvexSpace.of_strictConvex_closed_unit_ball [LinearMap.CompatibleSMul E E 𝕜 ℝ] (h : StrictConvex 𝕜 (closedBall (0 : E) 1)) : StrictConvexSpace 𝕜 E := ⟨fun r hr => by simpa only [smul_closedUnitBall_of_nonneg hr.le] using h.smul r⟩ #align strict_convex_space.of_strict_convex_closed_unit_ball StrictConvexSpace.of_strictConvex_closed_unit_ball theorem StrictConvexSpace.of_norm_combo_lt_one (h : ∀ x y : E, ‖x‖ = 1 → ‖y‖ = 1 → x ≠ y → ∃ a b : ℝ, a + b = 1 ∧ ‖a • x + b • y‖ < 1) : StrictConvexSpace ℝ E := by refine StrictConvexSpace.of_strictConvex_closed_unit_ball ℝ ((convex_closedBall _ _).strictConvex' fun x hx y hy hne => ?_) rw [interior_closedBall (0 : E) one_ne_zero, closedBall_diff_ball, mem_sphere_zero_iff_norm] at hx hy rcases h x y hx hy hne with ⟨a, b, hab, hlt⟩ use b rwa [AffineMap.lineMap_apply_module, interior_closedBall (0 : E) one_ne_zero, mem_ball_zero_iff, sub_eq_iff_eq_add.2 hab.symm] #align strict_convex_space.of_norm_combo_lt_one StrictConvexSpace.of_norm_combo_lt_one theorem StrictConvexSpace.of_norm_combo_ne_one (h : ∀ x y : E, ‖x‖ = 1 → ‖y‖ = 1 → x ≠ y → ∃ a b : ℝ, 0 ≤ a ∧ 0 ≤ b ∧ a + b = 1 ∧ ‖a • x + b • y‖ ≠ 1) : StrictConvexSpace ℝ E := by refine StrictConvexSpace.of_strictConvex_closed_unit_ball ℝ ((convex_closedBall _ _).strictConvex ?_) simp only [interior_closedBall _ one_ne_zero, closedBall_diff_ball, Set.Pairwise, frontier_closedBall _ one_ne_zero, mem_sphere_zero_iff_norm] intro x hx y hy hne rcases h x y hx hy hne with ⟨a, b, ha, hb, hab, hne'⟩ exact ⟨_, ⟨a, b, ha, hb, hab, rfl⟩, mt mem_sphere_zero_iff_norm.1 hne'⟩ #align strict_convex_space.of_norm_combo_ne_one StrictConvexSpace.of_norm_combo_ne_one	Mathlib/Analysis/Convex/StrictConvexSpace.lean	123	130	theorem StrictConvexSpace.of_norm_add_ne_two (h : ∀ ⦃x y : E⦄, ‖x‖ = 1 → ‖y‖ = 1 → x ≠ y → ‖x + y‖ ≠ 2) : StrictConvexSpace ℝ E := by	refine StrictConvexSpace.of_norm_combo_ne_one fun x y hx hy hne => ⟨1 / 2, 1 / 2, one_half_pos.le, one_half_pos.le, add_halves _, ?_⟩ rw [← smul_add, norm_smul, Real.norm_of_nonneg one_half_pos.le, one_div, ← div_eq_inv_mul, Ne, div_eq_one_iff_eq (two_ne_zero' ℝ)] exact h hx hy hne
import Mathlib.Algebra.Polynomial.Eval #align_import data.polynomial.degree.lemmas from "leanprover-community/mathlib"@"728baa2f54e6062c5879a3e397ac6bac323e506f" noncomputable section open Polynomial open Finsupp Finset namespace Polynomial universe u v w variable {R : Type u} {S : Type v} {ι : Type w} {a b : R} {m n : ℕ} section Semiring variable [Semiring R] {p q r : R[X]} section Degree theorem natDegree_comp_le : natDegree (p.comp q) ≤ natDegree p * natDegree q := letI := Classical.decEq R if h0 : p.comp q = 0 then by rw [h0, natDegree_zero]; exact Nat.zero_le _ else WithBot.coe_le_coe.1 <\| calc ↑(natDegree (p.comp q)) = degree (p.comp q) := (degree_eq_natDegree h0).symm _ = _ := congr_arg degree comp_eq_sum_left _ ≤ _ := degree_sum_le _ _ _ ≤ _ := Finset.sup_le fun n hn => calc degree (C (coeff p n) * q ^ n) ≤ degree (C (coeff p n)) + degree (q ^ n) := degree_mul_le _ _ _ ≤ natDegree (C (coeff p n)) + n • degree q := (add_le_add degree_le_natDegree (degree_pow_le _ _)) _ ≤ natDegree (C (coeff p n)) + n • ↑(natDegree q) := (add_le_add_left (nsmul_le_nsmul_right (@degree_le_natDegree _ _ q) n) _) _ = (n * natDegree q : ℕ) := by rw [natDegree_C, Nat.cast_zero, zero_add, nsmul_eq_mul]; simp _ ≤ (natDegree p * natDegree q : ℕ) := WithBot.coe_le_coe.2 <\| mul_le_mul_of_nonneg_right (le_natDegree_of_ne_zero (mem_support_iff.1 hn)) (Nat.zero_le _) #align polynomial.nat_degree_comp_le Polynomial.natDegree_comp_le theorem degree_pos_of_root {p : R[X]} (hp : p ≠ 0) (h : IsRoot p a) : 0 < degree p := lt_of_not_ge fun hlt => by have := eq_C_of_degree_le_zero hlt rw [IsRoot, this, eval_C] at h simp only [h, RingHom.map_zero] at this exact hp this #align polynomial.degree_pos_of_root Polynomial.degree_pos_of_root theorem natDegree_le_iff_coeff_eq_zero : p.natDegree ≤ n ↔ ∀ N : ℕ, n < N → p.coeff N = 0 := by simp_rw [natDegree_le_iff_degree_le, degree_le_iff_coeff_zero, Nat.cast_lt] #align polynomial.nat_degree_le_iff_coeff_eq_zero Polynomial.natDegree_le_iff_coeff_eq_zero theorem natDegree_add_le_iff_left {n : ℕ} (p q : R[X]) (qn : q.natDegree ≤ n) : (p + q).natDegree ≤ n ↔ p.natDegree ≤ n := by refine ⟨fun h => ?_, fun h => natDegree_add_le_of_degree_le h qn⟩ refine natDegree_le_iff_coeff_eq_zero.mpr fun m hm => ?_ convert natDegree_le_iff_coeff_eq_zero.mp h m hm using 1 rw [coeff_add, natDegree_le_iff_coeff_eq_zero.mp qn _ hm, add_zero] #align polynomial.nat_degree_add_le_iff_left Polynomial.natDegree_add_le_iff_left theorem natDegree_add_le_iff_right {n : ℕ} (p q : R[X]) (pn : p.natDegree ≤ n) : (p + q).natDegree ≤ n ↔ q.natDegree ≤ n := by rw [add_comm] exact natDegree_add_le_iff_left _ _ pn #align polynomial.nat_degree_add_le_iff_right Polynomial.natDegree_add_le_iff_right theorem natDegree_C_mul_le (a : R) (f : R[X]) : (C a * f).natDegree ≤ f.natDegree := calc (C a * f).natDegree ≤ (C a).natDegree + f.natDegree := natDegree_mul_le _ = 0 + f.natDegree := by rw [natDegree_C a] _ = f.natDegree := zero_add _ set_option linter.uppercaseLean3 false in #align polynomial.nat_degree_C_mul_le Polynomial.natDegree_C_mul_le theorem natDegree_mul_C_le (f : R[X]) (a : R) : (f * C a).natDegree ≤ f.natDegree := calc (f * C a).natDegree ≤ f.natDegree + (C a).natDegree := natDegree_mul_le _ = f.natDegree + 0 := by rw [natDegree_C a] _ = f.natDegree := add_zero _ set_option linter.uppercaseLean3 false in #align polynomial.nat_degree_mul_C_le Polynomial.natDegree_mul_C_le theorem eq_natDegree_of_le_mem_support (pn : p.natDegree ≤ n) (ns : n ∈ p.support) : p.natDegree = n := le_antisymm pn (le_natDegree_of_mem_supp _ ns) #align polynomial.eq_nat_degree_of_le_mem_support Polynomial.eq_natDegree_of_le_mem_support theorem natDegree_C_mul_eq_of_mul_eq_one {ai : R} (au : ai * a = 1) : (C a * p).natDegree = p.natDegree := le_antisymm (natDegree_C_mul_le a p) (calc p.natDegree = (1 * p).natDegree := by nth_rw 1 [← one_mul p] _ = (C ai * (C a * p)).natDegree := by rw [← C_1, ← au, RingHom.map_mul, ← mul_assoc] _ ≤ (C a * p).natDegree := natDegree_C_mul_le ai (C a * p)) set_option linter.uppercaseLean3 false in #align polynomial.nat_degree_C_mul_eq_of_mul_eq_one Polynomial.natDegree_C_mul_eq_of_mul_eq_one theorem natDegree_mul_C_eq_of_mul_eq_one {ai : R} (au : a * ai = 1) : (p * C a).natDegree = p.natDegree := le_antisymm (natDegree_mul_C_le p a) (calc p.natDegree = (p * 1).natDegree := by nth_rw 1 [← mul_one p] _ = (p * C a * C ai).natDegree := by rw [← C_1, ← au, RingHom.map_mul, ← mul_assoc] _ ≤ (p * C a).natDegree := natDegree_mul_C_le (p * C a) ai) set_option linter.uppercaseLean3 false in #align polynomial.nat_degree_mul_C_eq_of_mul_eq_one Polynomial.natDegree_mul_C_eq_of_mul_eq_one theorem natDegree_mul_C_eq_of_mul_ne_zero (h : p.leadingCoeff * a ≠ 0) : (p * C a).natDegree = p.natDegree := by refine eq_natDegree_of_le_mem_support (natDegree_mul_C_le p a) ?_ refine mem_support_iff.mpr ?_ rwa [coeff_mul_C] set_option linter.uppercaseLean3 false in #align polynomial.nat_degree_mul_C_eq_of_mul_ne_zero Polynomial.natDegree_mul_C_eq_of_mul_ne_zero theorem natDegree_C_mul_eq_of_mul_ne_zero (h : a * p.leadingCoeff ≠ 0) : (C a * p).natDegree = p.natDegree := by refine eq_natDegree_of_le_mem_support (natDegree_C_mul_le a p) ?_ refine mem_support_iff.mpr ?_ rwa [coeff_C_mul] set_option linter.uppercaseLean3 false in #align polynomial.nat_degree_C_mul_eq_of_mul_ne_zero Polynomial.natDegree_C_mul_eq_of_mul_ne_zero theorem natDegree_add_coeff_mul (f g : R[X]) : (f * g).coeff (f.natDegree + g.natDegree) = f.coeff f.natDegree * g.coeff g.natDegree := by simp only [coeff_natDegree, coeff_mul_degree_add_degree] #align polynomial.nat_degree_add_coeff_mul Polynomial.natDegree_add_coeff_mul theorem natDegree_lt_coeff_mul (h : p.natDegree + q.natDegree < m + n) : (p * q).coeff (m + n) = 0 := coeff_eq_zero_of_natDegree_lt (natDegree_mul_le.trans_lt h) #align polynomial.nat_degree_lt_coeff_mul Polynomial.natDegree_lt_coeff_mul theorem coeff_mul_of_natDegree_le (pm : p.natDegree ≤ m) (qn : q.natDegree ≤ n) : (p * q).coeff (m + n) = p.coeff m * q.coeff n := by simp_rw [← Polynomial.toFinsupp_apply, toFinsupp_mul] refine AddMonoidAlgebra.apply_add_of_supDegree_le ?_ Function.injective_id ?_ ?_ · simp · rwa [supDegree_eq_natDegree, id_eq] · rwa [supDegree_eq_natDegree, id_eq] #align polynomial.coeff_mul_of_nat_degree_le Polynomial.coeff_mul_of_natDegree_le theorem coeff_pow_of_natDegree_le (pn : p.natDegree ≤ n) : (p ^ m).coeff (m * n) = p.coeff n ^ m := by induction' m with m hm · simp · rw [pow_succ, pow_succ, ← hm, Nat.succ_mul, coeff_mul_of_natDegree_le _ pn] refine natDegree_pow_le.trans (le_trans ?_ (le_refl _)) exact mul_le_mul_of_nonneg_left pn m.zero_le #align polynomial.coeff_pow_of_nat_degree_le Polynomial.coeff_pow_of_natDegree_le theorem coeff_pow_eq_ite_of_natDegree_le_of_le {o : ℕ} (pn : natDegree p ≤ n) (mno : m * n ≤ o) : coeff (p ^ m) o = if o = m * n then (coeff p n) ^ m else 0 := by rcases eq_or_ne o (m * n) with rfl \| h · simpa only [ite_true] using coeff_pow_of_natDegree_le pn · simpa only [h, ite_false] using coeff_eq_zero_of_natDegree_lt <\| lt_of_le_of_lt (natDegree_pow_le_of_le m pn) (lt_of_le_of_ne mno h.symm) theorem coeff_add_eq_left_of_lt (qn : q.natDegree < n) : (p + q).coeff n = p.coeff n := (coeff_add _ _ _).trans <\| (congr_arg _ <\| coeff_eq_zero_of_natDegree_lt <\| qn).trans <\| add_zero _ #align polynomial.coeff_add_eq_left_of_lt Polynomial.coeff_add_eq_left_of_lt theorem coeff_add_eq_right_of_lt (pn : p.natDegree < n) : (p + q).coeff n = q.coeff n := by rw [add_comm] exact coeff_add_eq_left_of_lt pn #align polynomial.coeff_add_eq_right_of_lt Polynomial.coeff_add_eq_right_of_lt	Mathlib/Algebra/Polynomial/Degree/Lemmas.lean	199	222	theorem degree_sum_eq_of_disjoint (f : S → R[X]) (s : Finset S) (h : Set.Pairwise { i \| i ∈ s ∧ f i ≠ 0 } (Ne on degree ∘ f)) : degree (s.sum f) = s.sup fun i => degree (f i) := by	classical induction' s using Finset.induction_on with x s hx IH · simp · simp only [hx, Finset.sum_insert, not_false_iff, Finset.sup_insert] specialize IH (h.mono fun _ => by simp (config := { contextual := true })) rcases lt_trichotomy (degree (f x)) (degree (s.sum f)) with (H \| H \| H) · rw [← IH, sup_eq_right.mpr H.le, degree_add_eq_right_of_degree_lt H] · rcases s.eq_empty_or_nonempty with (rfl \| hs) · simp obtain ⟨y, hy, hy'⟩ := Finset.exists_mem_eq_sup s hs fun i => degree (f i) rw [IH, hy'] at H by_cases hx0 : f x = 0 · simp [hx0, IH] have hy0 : f y ≠ 0 := by contrapose! H simpa [H, degree_eq_bot] using hx0 refine absurd H (h ?_ ?_ fun H => hx ?_) · simp [hx0] · simp [hy, hy0] · exact H.symm ▸ hy · rw [← IH, sup_eq_left.mpr H.le, degree_add_eq_left_of_degree_lt H]
import Mathlib.Algebra.Lie.OfAssociative import Mathlib.Algebra.Lie.IdealOperations #align_import algebra.lie.abelian from "leanprover-community/mathlib"@"8983bec7cdf6cb2dd1f21315c8a34ab00d7b2f6d" universe u v w w₁ w₂ class LieModule.IsTrivial (L : Type v) (M : Type w) [Bracket L M] [Zero M] : Prop where trivial : ∀ (x : L) (m : M), ⁅x, m⁆ = 0 #align lie_module.is_trivial LieModule.IsTrivial @[simp] theorem trivial_lie_zero (L : Type v) (M : Type w) [Bracket L M] [Zero M] [LieModule.IsTrivial L M] (x : L) (m : M) : ⁅x, m⁆ = 0 := LieModule.IsTrivial.trivial x m #align trivial_lie_zero trivial_lie_zero instance LieModule.instIsTrivialOfSubsingleton {L M : Type} [LieRing L] [AddCommGroup M] [LieRingModule L M] [Subsingleton L] : LieModule.IsTrivial L M := ⟨fun x m ↦ by rw [Subsingleton.eq_zero x, zero_lie]⟩ instance LieModule.instIsTrivialOfSubsingleton' {L M : Type} [LieRing L] [AddCommGroup M] [LieRingModule L M] [Subsingleton M] : LieModule.IsTrivial L M := ⟨fun x m ↦ by simp_rw [Subsingleton.eq_zero m, lie_zero]⟩ abbrev IsLieAbelian (L : Type v) [Bracket L L] [Zero L] : Prop := LieModule.IsTrivial L L #align is_lie_abelian IsLieAbelian instance LieIdeal.isLieAbelian_of_trivial (R : Type u) (L : Type v) [CommRing R] [LieRing L] [LieAlgebra R L] (I : LieIdeal R L) [h : LieModule.IsTrivial L I] : IsLieAbelian I where trivial x y := by apply h.trivial #align lie_ideal.is_lie_abelian_of_trivial LieIdeal.isLieAbelian_of_trivial theorem Function.Injective.isLieAbelian {R : Type u} {L₁ : Type v} {L₂ : Type w} [CommRing R] [LieRing L₁] [LieRing L₂] [LieAlgebra R L₁] [LieAlgebra R L₂] {f : L₁ →ₗ⁅R⁆ L₂} (h₁ : Function.Injective f) (_ : IsLieAbelian L₂) : IsLieAbelian L₁ := { trivial := fun x y => h₁ <\| calc f ⁅x, y⁆ = ⁅f x, f y⁆ := LieHom.map_lie f x y _ = 0 := trivial_lie_zero _ _ _ _ _ = f 0 := f.map_zero.symm} #align function.injective.is_lie_abelian Function.Injective.isLieAbelian theorem Function.Surjective.isLieAbelian {R : Type u} {L₁ : Type v} {L₂ : Type w} [CommRing R] [LieRing L₁] [LieRing L₂] [LieAlgebra R L₁] [LieAlgebra R L₂] {f : L₁ →ₗ⁅R⁆ L₂} (h₁ : Function.Surjective f) (h₂ : IsLieAbelian L₁) : IsLieAbelian L₂ := { trivial := fun x y => by obtain ⟨u, rfl⟩ := h₁ x obtain ⟨v, rfl⟩ := h₁ y rw [← LieHom.map_lie, trivial_lie_zero, LieHom.map_zero] } #align function.surjective.is_lie_abelian Function.Surjective.isLieAbelian theorem lie_abelian_iff_equiv_lie_abelian {R : Type u} {L₁ : Type v} {L₂ : Type w} [CommRing R] [LieRing L₁] [LieRing L₂] [LieAlgebra R L₁] [LieAlgebra R L₂] (e : L₁ ≃ₗ⁅R⁆ L₂) : IsLieAbelian L₁ ↔ IsLieAbelian L₂ := ⟨e.symm.injective.isLieAbelian, e.injective.isLieAbelian⟩ #align lie_abelian_iff_equiv_lie_abelian lie_abelian_iff_equiv_lie_abelian theorem commutative_ring_iff_abelian_lie_ring {A : Type v} [Ring A] : Std.Commutative (α := A) (· * ·) ↔ IsLieAbelian A := by have h₁ : Std.Commutative (α := A) (· * ·) ↔ ∀ a b : A, a * b = b * a := ⟨fun h => h.1, fun h => ⟨h⟩⟩ have h₂ : IsLieAbelian A ↔ ∀ a b : A, ⁅a, b⁆ = 0 := ⟨fun h => h.1, fun h => ⟨h⟩⟩ simp only [h₁, h₂, LieRing.of_associative_ring_bracket, sub_eq_zero] #align commutative_ring_iff_abelian_lie_ring commutative_ring_iff_abelian_lie_ring section Center variable (R : Type u) (L : Type v) (M : Type w) (N : Type w₁) variable [CommRing R] [LieRing L] [LieAlgebra R L] variable [AddCommGroup M] [Module R M] [LieRingModule L M] [LieModule R L M] variable [AddCommGroup N] [Module R N] [LieRingModule L N] [LieModule R L N] namespace LieModule protected def ker : LieIdeal R L := (toEnd R L M).ker #align lie_module.ker LieModule.ker @[simp] protected theorem mem_ker (x : L) : x ∈ LieModule.ker R L M ↔ ∀ m : M, ⁅x, m⁆ = 0 := by simp only [LieModule.ker, LieHom.mem_ker, LinearMap.ext_iff, LinearMap.zero_apply, toEnd_apply_apply] #align lie_module.mem_ker LieModule.mem_ker def maxTrivSubmodule : LieSubmodule R L M where carrier := { m \| ∀ x : L, ⁅x, m⁆ = 0 } zero_mem' x := lie_zero x add_mem' {x y} hx hy z := by rw [lie_add, hx, hy, add_zero] smul_mem' c x hx y := by rw [lie_smul, hx, smul_zero] lie_mem {x m} hm y := by rw [hm, lie_zero] #align lie_module.max_triv_submodule LieModule.maxTrivSubmodule @[simp] theorem mem_maxTrivSubmodule (m : M) : m ∈ maxTrivSubmodule R L M ↔ ∀ x : L, ⁅x, m⁆ = 0 := Iff.rfl #align lie_module.mem_max_triv_submodule LieModule.mem_maxTrivSubmodule instance : IsTrivial L (maxTrivSubmodule R L M) where trivial x m := Subtype.ext (m.property x) @[simp] theorem ideal_oper_maxTrivSubmodule_eq_bot (I : LieIdeal R L) : ⁅I, maxTrivSubmodule R L M⁆ = ⊥ := by rw [← LieSubmodule.coe_toSubmodule_eq_iff, LieSubmodule.lieIdeal_oper_eq_linear_span, LieSubmodule.bot_coeSubmodule, Submodule.span_eq_bot] rintro m ⟨⟨x, hx⟩, ⟨⟨m, hm⟩, rfl⟩⟩ exact hm x #align lie_module.ideal_oper_max_triv_submodule_eq_bot LieModule.ideal_oper_maxTrivSubmodule_eq_bot theorem le_max_triv_iff_bracket_eq_bot {N : LieSubmodule R L M} : N ≤ maxTrivSubmodule R L M ↔ ⁅(⊤ : LieIdeal R L), N⁆ = ⊥ := by refine ⟨fun h => ?_, fun h m hm => ?_⟩ · rw [← le_bot_iff, ← ideal_oper_maxTrivSubmodule_eq_bot R L M ⊤] exact LieSubmodule.mono_lie_right _ _ ⊤ h · rw [mem_maxTrivSubmodule] rw [LieSubmodule.lie_eq_bot_iff] at h exact fun x => h x (LieSubmodule.mem_top x) m hm #align lie_module.le_max_triv_iff_bracket_eq_bot LieModule.le_max_triv_iff_bracket_eq_bot theorem trivial_iff_le_maximal_trivial (N : LieSubmodule R L M) : IsTrivial L N ↔ N ≤ maxTrivSubmodule R L M := ⟨fun h m hm x => IsTrivial.casesOn h fun h => Subtype.ext_iff.mp (h x ⟨m, hm⟩), fun h => { trivial := fun x m => Subtype.ext (h m.2 x) }⟩ #align lie_module.trivial_iff_le_maximal_trivial LieModule.trivial_iff_le_maximal_trivial theorem isTrivial_iff_max_triv_eq_top : IsTrivial L M ↔ maxTrivSubmodule R L M = ⊤ := by constructor · rintro ⟨h⟩; ext; simp only [mem_maxTrivSubmodule, h, forall_const, LieSubmodule.mem_top] · intro h; constructor; intro x m; revert x rw [← mem_maxTrivSubmodule R L M, h]; exact LieSubmodule.mem_top m #align lie_module.is_trivial_iff_max_triv_eq_top LieModule.isTrivial_iff_max_triv_eq_top variable {R L M N} def maxTrivHom (f : M →ₗ⁅R,L⁆ N) : maxTrivSubmodule R L M →ₗ⁅R,L⁆ maxTrivSubmodule R L N where toFun m := ⟨f m, fun x => (LieModuleHom.map_lie _ _ _).symm.trans <\| (congr_arg f (m.property x)).trans (LieModuleHom.map_zero _)⟩ map_add' m n := by simp [Function.comp_apply]; rfl -- Porting note: map_smul' t m := by simp [Function.comp_apply]; rfl -- these two were `by simpa` map_lie' {x m} := by simp #align lie_module.max_triv_hom LieModule.maxTrivHom @[norm_cast, simp] theorem coe_maxTrivHom_apply (f : M →ₗ⁅R,L⁆ N) (m : maxTrivSubmodule R L M) : (maxTrivHom f m : N) = f m := rfl #align lie_module.coe_max_triv_hom_apply LieModule.coe_maxTrivHom_apply def maxTrivEquiv (e : M ≃ₗ⁅R,L⁆ N) : maxTrivSubmodule R L M ≃ₗ⁅R,L⁆ maxTrivSubmodule R L N := { maxTrivHom (e : M →ₗ⁅R,L⁆ N) with toFun := maxTrivHom (e : M →ₗ⁅R,L⁆ N) invFun := maxTrivHom (e.symm : N →ₗ⁅R,L⁆ M) left_inv := fun m => by ext; simp [LieModuleEquiv.coe_to_lieModuleHom] right_inv := fun n => by ext; simp [LieModuleEquiv.coe_to_lieModuleHom] } #align lie_module.max_triv_equiv LieModule.maxTrivEquiv @[norm_cast, simp] theorem coe_maxTrivEquiv_apply (e : M ≃ₗ⁅R,L⁆ N) (m : maxTrivSubmodule R L M) : (maxTrivEquiv e m : N) = e ↑m := rfl #align lie_module.coe_max_triv_equiv_apply LieModule.coe_maxTrivEquiv_apply @[simp] theorem maxTrivEquiv_of_refl_eq_refl : maxTrivEquiv (LieModuleEquiv.refl : M ≃ₗ⁅R,L⁆ M) = LieModuleEquiv.refl := by ext; simp only [coe_maxTrivEquiv_apply, LieModuleEquiv.refl_apply] #align lie_module.max_triv_equiv_of_refl_eq_refl LieModule.maxTrivEquiv_of_refl_eq_refl @[simp] theorem maxTrivEquiv_of_equiv_symm_eq_symm (e : M ≃ₗ⁅R,L⁆ N) : (maxTrivEquiv e).symm = maxTrivEquiv e.symm := rfl #align lie_module.max_triv_equiv_of_equiv_symm_eq_symm LieModule.maxTrivEquiv_of_equiv_symm_eq_symm def maxTrivLinearMapEquivLieModuleHom : maxTrivSubmodule R L (M →ₗ[R] N) ≃ₗ[R] M →ₗ⁅R,L⁆ N where toFun f := { toLinearMap := f.val map_lie' := fun {x m} => by have hf : ⁅x, f.val⁆ m = 0 := by rw [f.property x, LinearMap.zero_apply] rw [LieHom.lie_apply, sub_eq_zero, ← LinearMap.toFun_eq_coe] at hf; exact hf.symm} map_add' f g := by ext; simp map_smul' F G := by ext; simp invFun F := ⟨F, fun x => by ext; simp⟩ left_inv f := by simp right_inv F := by simp #align lie_module.max_triv_linear_map_equiv_lie_module_hom LieModule.maxTrivLinearMapEquivLieModuleHom @[simp]	Mathlib/Algebra/Lie/Abelian.lean	228	229	theorem coe_maxTrivLinearMapEquivLieModuleHom (f : maxTrivSubmodule R L (M →ₗ[R] N)) : (maxTrivLinearMapEquivLieModuleHom f : M → N) = f := by	ext; rfl
import Mathlib.Data.Matrix.Basic import Mathlib.LinearAlgebra.Matrix.Trace #align_import data.matrix.basis from "leanprover-community/mathlib"@"320df450e9abeb5fc6417971e75acb6ae8bc3794" variable {l m n : Type} variable {R α : Type} namespace Matrix open Matrix variable [DecidableEq l] [DecidableEq m] [DecidableEq n] variable [Semiring α] def stdBasisMatrix (i : m) (j : n) (a : α) : Matrix m n α := fun i' j' => if i = i' ∧ j = j' then a else 0 #align matrix.std_basis_matrix Matrix.stdBasisMatrix @[simp] theorem smul_stdBasisMatrix [SMulZeroClass R α] (r : R) (i : m) (j : n) (a : α) : r • stdBasisMatrix i j a = stdBasisMatrix i j (r • a) := by unfold stdBasisMatrix ext simp [smul_ite] #align matrix.smul_std_basis_matrix Matrix.smul_stdBasisMatrix @[simp] theorem stdBasisMatrix_zero (i : m) (j : n) : stdBasisMatrix i j (0 : α) = 0 := by unfold stdBasisMatrix ext simp #align matrix.std_basis_matrix_zero Matrix.stdBasisMatrix_zero theorem stdBasisMatrix_add (i : m) (j : n) (a b : α) : stdBasisMatrix i j (a + b) = stdBasisMatrix i j a + stdBasisMatrix i j b := by unfold stdBasisMatrix; ext split_ifs with h <;> simp [h] #align matrix.std_basis_matrix_add Matrix.stdBasisMatrix_add theorem mulVec_stdBasisMatrix [Fintype m] (i : n) (j : m) (c : α) (x : m → α) : mulVec (stdBasisMatrix i j c) x = Function.update (0 : n → α) i (c * x j) := by ext i' simp [stdBasisMatrix, mulVec, dotProduct] rcases eq_or_ne i i' with rfl\|h · simp simp [h, h.symm] theorem matrix_eq_sum_std_basis [Fintype m] [Fintype n] (x : Matrix m n α) : x = ∑ i : m, ∑ j : n, stdBasisMatrix i j (x i j) := by ext i j; symm iterate 2 rw [Finset.sum_apply] -- Porting note: was `convert` refine (Fintype.sum_eq_single i ?_).trans ?_; swap · -- Porting note: `simp` seems unwilling to apply `Fintype.sum_apply` simp (config := { unfoldPartialApp := true }) only [stdBasisMatrix] rw [Fintype.sum_apply, Fintype.sum_apply] simp · intro j' hj' -- Porting note: `simp` seems unwilling to apply `Fintype.sum_apply` simp (config := { unfoldPartialApp := true }) only [stdBasisMatrix] rw [Fintype.sum_apply, Fintype.sum_apply] simp [hj'] #align matrix.matrix_eq_sum_std_basis Matrix.matrix_eq_sum_std_basis -- TODO: tie this up with the `Basis` machinery of linear algebra -- this is not completely trivial because we are indexing by two types, instead of one -- TODO: add `std_basis_vec` theorem std_basis_eq_basis_mul_basis (i : m) (j : n) : stdBasisMatrix i j (1 : α) = vecMulVec (fun i' => ite (i = i') 1 0) fun j' => ite (j = j') 1 0 := by ext i' j' -- Porting note: was `norm_num [std_basis_matrix, vec_mul_vec]` though there are no numerals -- involved. simp only [stdBasisMatrix, vecMulVec, mul_ite, mul_one, mul_zero, of_apply] -- Porting note: added next line simp_rw [@and_comm (i = i')] exact ite_and _ _ _ _ #align matrix.std_basis_eq_basis_mul_basis Matrix.std_basis_eq_basis_mul_basis -- todo: the old proof used fintypes, I don't know `Finsupp` but this feels generalizable @[elab_as_elim] protected theorem induction_on' [Finite m] [Finite n] {P : Matrix m n α → Prop} (M : Matrix m n α) (h_zero : P 0) (h_add : ∀ p q, P p → P q → P (p + q)) (h_std_basis : ∀ (i : m) (j : n) (x : α), P (stdBasisMatrix i j x)) : P M := by cases nonempty_fintype m; cases nonempty_fintype n rw [matrix_eq_sum_std_basis M, ← Finset.sum_product'] apply Finset.sum_induction _ _ h_add h_zero · intros apply h_std_basis #align matrix.induction_on' Matrix.induction_on' @[elab_as_elim] protected theorem induction_on [Finite m] [Finite n] [Nonempty m] [Nonempty n] {P : Matrix m n α → Prop} (M : Matrix m n α) (h_add : ∀ p q, P p → P q → P (p + q)) (h_std_basis : ∀ i j x, P (stdBasisMatrix i j x)) : P M := Matrix.induction_on' M (by inhabit m inhabit n simpa using h_std_basis default default 0) h_add h_std_basis #align matrix.induction_on Matrix.induction_on namespace StdBasisMatrix section variable (i : m) (j : n) (c : α) (i' : m) (j' : n) @[simp] theorem apply_same : stdBasisMatrix i j c i j = c := if_pos (And.intro rfl rfl) #align matrix.std_basis_matrix.apply_same Matrix.StdBasisMatrix.apply_same @[simp] theorem apply_of_ne (h : ¬(i = i' ∧ j = j')) : stdBasisMatrix i j c i' j' = 0 := by simp only [stdBasisMatrix, and_imp, ite_eq_right_iff] tauto #align matrix.std_basis_matrix.apply_of_ne Matrix.StdBasisMatrix.apply_of_ne @[simp]	Mathlib/Data/Matrix/Basis.lean	139	140	theorem apply_of_row_ne {i i' : m} (hi : i ≠ i') (j j' : n) (a : α) : stdBasisMatrix i j a i' j' = 0 := by	simp [hi]
import Mathlib.Algebra.Algebra.Defs import Mathlib.Algebra.Polynomial.FieldDivision import Mathlib.FieldTheory.Minpoly.Basic import Mathlib.RingTheory.Adjoin.Basic import Mathlib.RingTheory.FinitePresentation import Mathlib.RingTheory.FiniteType import Mathlib.RingTheory.PowerBasis import Mathlib.RingTheory.PrincipalIdealDomain import Mathlib.RingTheory.QuotientNoetherian #align_import ring_theory.adjoin_root from "leanprover-community/mathlib"@"5c4b3d41a84bd2a1d79c7d9265e58a891e71be89" noncomputable section open scoped Classical open Polynomial universe u v w variable {R : Type u} {S : Type v} {K : Type w} open Polynomial Ideal def AdjoinRoot [CommRing R] (f : R[X]) : Type u := Polynomial R ⧸ (span {f} : Ideal R[X]) #align adjoin_root AdjoinRoot namespace AdjoinRoot section CommRing variable [CommRing R] (f : R[X]) instance instCommRing : CommRing (AdjoinRoot f) := Ideal.Quotient.commRing _ #align adjoin_root.comm_ring AdjoinRoot.instCommRing instance : Inhabited (AdjoinRoot f) := ⟨0⟩ instance : DecidableEq (AdjoinRoot f) := Classical.decEq _ protected theorem nontrivial [IsDomain R] (h : degree f ≠ 0) : Nontrivial (AdjoinRoot f) := Ideal.Quotient.nontrivial (by simp_rw [Ne, span_singleton_eq_top, Polynomial.isUnit_iff, not_exists, not_and] rintro x hx rfl exact h (degree_C hx.ne_zero)) #align adjoin_root.nontrivial AdjoinRoot.nontrivial def mk : R[X] →+* AdjoinRoot f := Ideal.Quotient.mk _ #align adjoin_root.mk AdjoinRoot.mk @[elab_as_elim] theorem induction_on {C : AdjoinRoot f → Prop} (x : AdjoinRoot f) (ih : ∀ p : R[X], C (mk f p)) : C x := Quotient.inductionOn' x ih #align adjoin_root.induction_on AdjoinRoot.induction_on def of : R →+* AdjoinRoot f := (mk f).comp C #align adjoin_root.of AdjoinRoot.of instance instSMulAdjoinRoot [DistribSMul S R] [IsScalarTower S R R] : SMul S (AdjoinRoot f) := Submodule.Quotient.instSMul' _ instance [DistribSMul S R] [IsScalarTower S R R] : DistribSMul S (AdjoinRoot f) := Submodule.Quotient.distribSMul' _ @[simp] theorem smul_mk [DistribSMul S R] [IsScalarTower S R R] (a : S) (x : R[X]) : a • mk f x = mk f (a • x) := rfl #align adjoin_root.smul_mk AdjoinRoot.smul_mk	Mathlib/RingTheory/AdjoinRoot.lean	120	121	theorem smul_of [DistribSMul S R] [IsScalarTower S R R] (a : S) (x : R) : a • of f x = of f (a • x) := by	rw [of, RingHom.comp_apply, RingHom.comp_apply, smul_mk, smul_C]
import Batteries.Classes.Order namespace Batteries.PairingHeapImp inductive Heap (α : Type u) where \| nil : Heap α \| node (a : α) (child sibling : Heap α) : Heap α deriving Repr def Heap.size : Heap α → Nat \| .nil => 0 \| .node _ c s => c.size + 1 + s.size def Heap.singleton (a : α) : Heap α := .node a .nil .nil def Heap.isEmpty : Heap α → Bool \| .nil => true \| _ => false @[specialize] def Heap.merge (le : α → α → Bool) : Heap α → Heap α → Heap α \| .nil, .nil => .nil \| .nil, .node a₂ c₂ _ => .node a₂ c₂ .nil \| .node a₁ c₁ _, .nil => .node a₁ c₁ .nil \| .node a₁ c₁ _, .node a₂ c₂ _ => if le a₁ a₂ then .node a₁ (.node a₂ c₂ c₁) .nil else .node a₂ (.node a₁ c₁ c₂) .nil @[specialize] def Heap.combine (le : α → α → Bool) : Heap α → Heap α \| h₁@(.node _ _ h₂@(.node _ _ s)) => merge le (merge le h₁ h₂) (s.combine le) \| h => h @[inline] def Heap.headD (a : α) : Heap α → α \| .nil => a \| .node a _ _ => a @[inline] def Heap.head? : Heap α → Option α \| .nil => none \| .node a _ _ => some a @[inline] def Heap.deleteMin (le : α → α → Bool) : Heap α → Option (α × Heap α) \| .nil => none \| .node a c _ => (a, combine le c) @[inline] def Heap.tail? (le : α → α → Bool) (h : Heap α) : Option (Heap α) := deleteMin le h \|>.map (·.snd) @[inline] def Heap.tail (le : α → α → Bool) (h : Heap α) : Heap α := tail? le h \|>.getD .nil inductive Heap.NoSibling : Heap α → Prop \| nil : NoSibling .nil \| node (a c) : NoSibling (.node a c .nil) instance : Decidable (Heap.NoSibling s) := match s with \| .nil => isTrue .nil \| .node a c .nil => isTrue (.node a c) \| .node _ _ (.node _ _ _) => isFalse nofun theorem Heap.noSibling_merge (le) (s₁ s₂ : Heap α) : (s₁.merge le s₂).NoSibling := by unfold merge (split <;> try split) <;> constructor theorem Heap.noSibling_combine (le) (s : Heap α) : (s.combine le).NoSibling := by unfold combine; split · exact noSibling_merge _ _ _ · match s with \| nil \| node _ _ nil => constructor \| node _ _ (node _ _ s) => rename_i h; exact (h _ _ _ _ _ rfl).elim theorem Heap.noSibling_deleteMin {s : Heap α} (eq : s.deleteMin le = some (a, s')) : s'.NoSibling := by cases s with cases eq \| node a c => exact noSibling_combine _ _	.lake/packages/batteries/Batteries/Data/PairingHeap.lean	107	111	theorem Heap.noSibling_tail? {s : Heap α} : s.tail? le = some s' → s'.NoSibling := by	simp only [Heap.tail?]; intro eq match eq₂ : s.deleteMin le, eq with \| some (a, tl), rfl => exact noSibling_deleteMin eq₂
import Mathlib.Init.ZeroOne import Mathlib.Data.Set.Defs import Mathlib.Order.Basic import Mathlib.Order.SymmDiff import Mathlib.Tactic.Tauto import Mathlib.Tactic.ByContra import Mathlib.Util.Delaborators #align_import data.set.basic from "leanprover-community/mathlib"@"001ffdc42920050657fd45bd2b8bfbec8eaaeb29" open Function universe u v w x namespace Set variable {α : Type u} {s t : Set α} instance instBooleanAlgebraSet : BooleanAlgebra (Set α) := { (inferInstance : BooleanAlgebra (α → Prop)) with sup := (· ∪ ·), le := (· ≤ ·), lt := fun s t => s ⊆ t ∧ ¬t ⊆ s, inf := (· ∩ ·), bot := ∅, compl := (·ᶜ), top := univ, sdiff := (· \ ·) } instance : HasSSubset (Set α) := ⟨(· < ·)⟩ @[simp] theorem top_eq_univ : (⊤ : Set α) = univ := rfl #align set.top_eq_univ Set.top_eq_univ @[simp] theorem bot_eq_empty : (⊥ : Set α) = ∅ := rfl #align set.bot_eq_empty Set.bot_eq_empty @[simp] theorem sup_eq_union : ((· ⊔ ·) : Set α → Set α → Set α) = (· ∪ ·) := rfl #align set.sup_eq_union Set.sup_eq_union @[simp] theorem inf_eq_inter : ((· ⊓ ·) : Set α → Set α → Set α) = (· ∩ ·) := rfl #align set.inf_eq_inter Set.inf_eq_inter @[simp] theorem le_eq_subset : ((· ≤ ·) : Set α → Set α → Prop) = (· ⊆ ·) := rfl #align set.le_eq_subset Set.le_eq_subset @[simp] theorem lt_eq_ssubset : ((· < ·) : Set α → Set α → Prop) = (· ⊂ ·) := rfl #align set.lt_eq_ssubset Set.lt_eq_ssubset theorem le_iff_subset : s ≤ t ↔ s ⊆ t := Iff.rfl #align set.le_iff_subset Set.le_iff_subset theorem lt_iff_ssubset : s < t ↔ s ⊂ t := Iff.rfl #align set.lt_iff_ssubset Set.lt_iff_ssubset alias ⟨_root_.LE.le.subset, _root_.HasSubset.Subset.le⟩ := le_iff_subset #align has_subset.subset.le HasSubset.Subset.le alias ⟨_root_.LT.lt.ssubset, _root_.HasSSubset.SSubset.lt⟩ := lt_iff_ssubset #align has_ssubset.ssubset.lt HasSSubset.SSubset.lt instance PiSetCoe.canLift (ι : Type u) (α : ι → Type v) [∀ i, Nonempty (α i)] (s : Set ι) : CanLift (∀ i : s, α i) (∀ i, α i) (fun f i => f i) fun _ => True := PiSubtype.canLift ι α s #align set.pi_set_coe.can_lift Set.PiSetCoe.canLift instance PiSetCoe.canLift' (ι : Type u) (α : Type v) [Nonempty α] (s : Set ι) : CanLift (s → α) (ι → α) (fun f i => f i) fun _ => True := PiSetCoe.canLift ι (fun _ => α) s #align set.pi_set_coe.can_lift' Set.PiSetCoe.canLift' end Set theorem Subtype.mem {α : Type} {s : Set α} (p : s) : (p : α) ∈ s := p.prop #align subtype.mem Subtype.mem theorem Eq.subset {α} {s t : Set α} : s = t → s ⊆ t := fun h₁ _ h₂ => by rw [← h₁]; exact h₂ #align eq.subset Eq.subset namespace Set variable {α : Type u} {β : Type v} {γ : Type w} {ι : Sort x} {a b : α} {s s₁ s₂ t t₁ t₂ u : Set α} instance : Inhabited (Set α) := ⟨∅⟩ theorem ext_iff {s t : Set α} : s = t ↔ ∀ x, x ∈ s ↔ x ∈ t := ⟨fun h x => by rw [h], ext⟩ #align set.ext_iff Set.ext_iff @[trans] theorem mem_of_mem_of_subset {x : α} {s t : Set α} (hx : x ∈ s) (h : s ⊆ t) : x ∈ t := h hx #align set.mem_of_mem_of_subset Set.mem_of_mem_of_subset theorem forall_in_swap {p : α → β → Prop} : (∀ a ∈ s, ∀ (b), p a b) ↔ ∀ (b), ∀ a ∈ s, p a b := by tauto #align set.forall_in_swap Set.forall_in_swap theorem mem_setOf {a : α} {p : α → Prop} : a ∈ { x \| p x } ↔ p a := Iff.rfl #align set.mem_set_of Set.mem_setOf theorem _root_.Membership.mem.out {p : α → Prop} {a : α} (h : a ∈ { x \| p x }) : p a := h #align has_mem.mem.out Membership.mem.out theorem nmem_setOf_iff {a : α} {p : α → Prop} : a ∉ { x \| p x } ↔ ¬p a := Iff.rfl #align set.nmem_set_of_iff Set.nmem_setOf_iff @[simp] theorem setOf_mem_eq {s : Set α} : { x \| x ∈ s } = s := rfl #align set.set_of_mem_eq Set.setOf_mem_eq theorem setOf_set {s : Set α} : setOf s = s := rfl #align set.set_of_set Set.setOf_set theorem setOf_app_iff {p : α → Prop} {x : α} : { x \| p x } x ↔ p x := Iff.rfl #align set.set_of_app_iff Set.setOf_app_iff theorem mem_def {a : α} {s : Set α} : a ∈ s ↔ s a := Iff.rfl #align set.mem_def Set.mem_def theorem setOf_bijective : Bijective (setOf : (α → Prop) → Set α) := bijective_id #align set.set_of_bijective Set.setOf_bijective theorem subset_setOf {p : α → Prop} {s : Set α} : s ⊆ setOf p ↔ ∀ x, x ∈ s → p x := Iff.rfl theorem setOf_subset {p : α → Prop} {s : Set α} : setOf p ⊆ s ↔ ∀ x, p x → x ∈ s := Iff.rfl @[simp] theorem setOf_subset_setOf {p q : α → Prop} : { a \| p a } ⊆ { a \| q a } ↔ ∀ a, p a → q a := Iff.rfl #align set.set_of_subset_set_of Set.setOf_subset_setOf theorem setOf_and {p q : α → Prop} : { a \| p a ∧ q a } = { a \| p a } ∩ { a \| q a } := rfl #align set.set_of_and Set.setOf_and theorem setOf_or {p q : α → Prop} : { a \| p a ∨ q a } = { a \| p a } ∪ { a \| q a } := rfl #align set.set_of_or Set.setOf_or instance : IsRefl (Set α) (· ⊆ ·) := show IsRefl (Set α) (· ≤ ·) by infer_instance instance : IsTrans (Set α) (· ⊆ ·) := show IsTrans (Set α) (· ≤ ·) by infer_instance instance : Trans ((· ⊆ ·) : Set α → Set α → Prop) (· ⊆ ·) (· ⊆ ·) := show Trans (· ≤ ·) (· ≤ ·) (· ≤ ·) by infer_instance instance : IsAntisymm (Set α) (· ⊆ ·) := show IsAntisymm (Set α) (· ≤ ·) by infer_instance instance : IsIrrefl (Set α) (· ⊂ ·) := show IsIrrefl (Set α) (· < ·) by infer_instance instance : IsTrans (Set α) (· ⊂ ·) := show IsTrans (Set α) (· < ·) by infer_instance instance : Trans ((· ⊂ ·) : Set α → Set α → Prop) (· ⊂ ·) (· ⊂ ·) := show Trans (· < ·) (· < ·) (· < ·) by infer_instance instance : Trans ((· ⊂ ·) : Set α → Set α → Prop) (· ⊆ ·) (· ⊂ ·) := show Trans (· < ·) (· ≤ ·) (· < ·) by infer_instance instance : Trans ((· ⊆ ·) : Set α → Set α → Prop) (· ⊂ ·) (· ⊂ ·) := show Trans (· ≤ ·) (· < ·) (· < ·) by infer_instance instance : IsAsymm (Set α) (· ⊂ ·) := show IsAsymm (Set α) (· < ·) by infer_instance instance : IsNonstrictStrictOrder (Set α) (· ⊆ ·) (· ⊂ ·) := ⟨fun _ _ => Iff.rfl⟩ -- TODO(Jeremy): write a tactic to unfold specific instances of generic notation? theorem subset_def : (s ⊆ t) = ∀ x, x ∈ s → x ∈ t := rfl #align set.subset_def Set.subset_def theorem ssubset_def : (s ⊂ t) = (s ⊆ t ∧ ¬t ⊆ s) := rfl #align set.ssubset_def Set.ssubset_def @[refl] theorem Subset.refl (a : Set α) : a ⊆ a := fun _ => id #align set.subset.refl Set.Subset.refl theorem Subset.rfl {s : Set α} : s ⊆ s := Subset.refl s #align set.subset.rfl Set.Subset.rfl @[trans] theorem Subset.trans {a b c : Set α} (ab : a ⊆ b) (bc : b ⊆ c) : a ⊆ c := fun _ h => bc <\| ab h #align set.subset.trans Set.Subset.trans @[trans] theorem mem_of_eq_of_mem {x y : α} {s : Set α} (hx : x = y) (h : y ∈ s) : x ∈ s := hx.symm ▸ h #align set.mem_of_eq_of_mem Set.mem_of_eq_of_mem theorem Subset.antisymm {a b : Set α} (h₁ : a ⊆ b) (h₂ : b ⊆ a) : a = b := Set.ext fun _ => ⟨@h₁ _, @h₂ _⟩ #align set.subset.antisymm Set.Subset.antisymm theorem Subset.antisymm_iff {a b : Set α} : a = b ↔ a ⊆ b ∧ b ⊆ a := ⟨fun e => ⟨e.subset, e.symm.subset⟩, fun ⟨h₁, h₂⟩ => Subset.antisymm h₁ h₂⟩ #align set.subset.antisymm_iff Set.Subset.antisymm_iff -- an alternative name theorem eq_of_subset_of_subset {a b : Set α} : a ⊆ b → b ⊆ a → a = b := Subset.antisymm #align set.eq_of_subset_of_subset Set.eq_of_subset_of_subset theorem mem_of_subset_of_mem {s₁ s₂ : Set α} {a : α} (h : s₁ ⊆ s₂) : a ∈ s₁ → a ∈ s₂ := @h _ #align set.mem_of_subset_of_mem Set.mem_of_subset_of_mem theorem not_mem_subset (h : s ⊆ t) : a ∉ t → a ∉ s := mt <\| mem_of_subset_of_mem h #align set.not_mem_subset Set.not_mem_subset theorem not_subset : ¬s ⊆ t ↔ ∃ a ∈ s, a ∉ t := by simp only [subset_def, not_forall, exists_prop] #align set.not_subset Set.not_subset lemma eq_of_forall_subset_iff (h : ∀ u, s ⊆ u ↔ t ⊆ u) : s = t := eq_of_forall_ge_iff h protected theorem eq_or_ssubset_of_subset (h : s ⊆ t) : s = t ∨ s ⊂ t := eq_or_lt_of_le h #align set.eq_or_ssubset_of_subset Set.eq_or_ssubset_of_subset theorem exists_of_ssubset {s t : Set α} (h : s ⊂ t) : ∃ x ∈ t, x ∉ s := not_subset.1 h.2 #align set.exists_of_ssubset Set.exists_of_ssubset protected theorem ssubset_iff_subset_ne {s t : Set α} : s ⊂ t ↔ s ⊆ t ∧ s ≠ t := @lt_iff_le_and_ne (Set α) _ s t #align set.ssubset_iff_subset_ne Set.ssubset_iff_subset_ne theorem ssubset_iff_of_subset {s t : Set α} (h : s ⊆ t) : s ⊂ t ↔ ∃ x ∈ t, x ∉ s := ⟨exists_of_ssubset, fun ⟨_, hxt, hxs⟩ => ⟨h, fun h => hxs <\| h hxt⟩⟩ #align set.ssubset_iff_of_subset Set.ssubset_iff_of_subset protected theorem ssubset_of_ssubset_of_subset {s₁ s₂ s₃ : Set α} (hs₁s₂ : s₁ ⊂ s₂) (hs₂s₃ : s₂ ⊆ s₃) : s₁ ⊂ s₃ := ⟨Subset.trans hs₁s₂.1 hs₂s₃, fun hs₃s₁ => hs₁s₂.2 (Subset.trans hs₂s₃ hs₃s₁)⟩ #align set.ssubset_of_ssubset_of_subset Set.ssubset_of_ssubset_of_subset protected theorem ssubset_of_subset_of_ssubset {s₁ s₂ s₃ : Set α} (hs₁s₂ : s₁ ⊆ s₂) (hs₂s₃ : s₂ ⊂ s₃) : s₁ ⊂ s₃ := ⟨Subset.trans hs₁s₂ hs₂s₃.1, fun hs₃s₁ => hs₂s₃.2 (Subset.trans hs₃s₁ hs₁s₂)⟩ #align set.ssubset_of_subset_of_ssubset Set.ssubset_of_subset_of_ssubset theorem not_mem_empty (x : α) : ¬x ∈ (∅ : Set α) := id #align set.not_mem_empty Set.not_mem_empty -- Porting note (#10618): removed `simp` because `simp` can prove it theorem not_not_mem : ¬a ∉ s ↔ a ∈ s := not_not #align set.not_not_mem Set.not_not_mem -- Porting note: we seem to need parentheses at `(↥s)`, -- even if we increase the right precedence of `↥` in `Mathlib.Tactic.Coe`. -- Porting note: removed `simp` as it is competing with `nonempty_subtype`. -- @[simp] theorem nonempty_coe_sort {s : Set α} : Nonempty (↥s) ↔ s.Nonempty := nonempty_subtype #align set.nonempty_coe_sort Set.nonempty_coe_sort alias ⟨_, Nonempty.coe_sort⟩ := nonempty_coe_sort #align set.nonempty.coe_sort Set.Nonempty.coe_sort theorem nonempty_def : s.Nonempty ↔ ∃ x, x ∈ s := Iff.rfl #align set.nonempty_def Set.nonempty_def theorem nonempty_of_mem {x} (h : x ∈ s) : s.Nonempty := ⟨x, h⟩ #align set.nonempty_of_mem Set.nonempty_of_mem theorem Nonempty.not_subset_empty : s.Nonempty → ¬s ⊆ ∅ \| ⟨_, hx⟩, hs => hs hx #align set.nonempty.not_subset_empty Set.Nonempty.not_subset_empty protected noncomputable def Nonempty.some (h : s.Nonempty) : α := Classical.choose h #align set.nonempty.some Set.Nonempty.some protected theorem Nonempty.some_mem (h : s.Nonempty) : h.some ∈ s := Classical.choose_spec h #align set.nonempty.some_mem Set.Nonempty.some_mem theorem Nonempty.mono (ht : s ⊆ t) (hs : s.Nonempty) : t.Nonempty := hs.imp ht #align set.nonempty.mono Set.Nonempty.mono theorem nonempty_of_not_subset (h : ¬s ⊆ t) : (s \ t).Nonempty := let ⟨x, xs, xt⟩ := not_subset.1 h ⟨x, xs, xt⟩ #align set.nonempty_of_not_subset Set.nonempty_of_not_subset theorem nonempty_of_ssubset (ht : s ⊂ t) : (t \ s).Nonempty := nonempty_of_not_subset ht.2 #align set.nonempty_of_ssubset Set.nonempty_of_ssubset theorem Nonempty.of_diff (h : (s \ t).Nonempty) : s.Nonempty := h.imp fun _ => And.left #align set.nonempty.of_diff Set.Nonempty.of_diff theorem nonempty_of_ssubset' (ht : s ⊂ t) : t.Nonempty := (nonempty_of_ssubset ht).of_diff #align set.nonempty_of_ssubset' Set.nonempty_of_ssubset' theorem Nonempty.inl (hs : s.Nonempty) : (s ∪ t).Nonempty := hs.imp fun _ => Or.inl #align set.nonempty.inl Set.Nonempty.inl theorem Nonempty.inr (ht : t.Nonempty) : (s ∪ t).Nonempty := ht.imp fun _ => Or.inr #align set.nonempty.inr Set.Nonempty.inr @[simp] theorem union_nonempty : (s ∪ t).Nonempty ↔ s.Nonempty ∨ t.Nonempty := exists_or #align set.union_nonempty Set.union_nonempty theorem Nonempty.left (h : (s ∩ t).Nonempty) : s.Nonempty := h.imp fun _ => And.left #align set.nonempty.left Set.Nonempty.left theorem Nonempty.right (h : (s ∩ t).Nonempty) : t.Nonempty := h.imp fun _ => And.right #align set.nonempty.right Set.Nonempty.right theorem inter_nonempty : (s ∩ t).Nonempty ↔ ∃ x, x ∈ s ∧ x ∈ t := Iff.rfl #align set.inter_nonempty Set.inter_nonempty theorem inter_nonempty_iff_exists_left : (s ∩ t).Nonempty ↔ ∃ x ∈ s, x ∈ t := by simp_rw [inter_nonempty] #align set.inter_nonempty_iff_exists_left Set.inter_nonempty_iff_exists_left theorem inter_nonempty_iff_exists_right : (s ∩ t).Nonempty ↔ ∃ x ∈ t, x ∈ s := by simp_rw [inter_nonempty, and_comm] #align set.inter_nonempty_iff_exists_right Set.inter_nonempty_iff_exists_right theorem nonempty_iff_univ_nonempty : Nonempty α ↔ (univ : Set α).Nonempty := ⟨fun ⟨x⟩ => ⟨x, trivial⟩, fun ⟨x, _⟩ => ⟨x⟩⟩ #align set.nonempty_iff_univ_nonempty Set.nonempty_iff_univ_nonempty @[simp] theorem univ_nonempty : ∀ [Nonempty α], (univ : Set α).Nonempty \| ⟨x⟩ => ⟨x, trivial⟩ #align set.univ_nonempty Set.univ_nonempty theorem Nonempty.to_subtype : s.Nonempty → Nonempty (↥s) := nonempty_subtype.2 #align set.nonempty.to_subtype Set.Nonempty.to_subtype theorem Nonempty.to_type : s.Nonempty → Nonempty α := fun ⟨x, _⟩ => ⟨x⟩ #align set.nonempty.to_type Set.Nonempty.to_type instance univ.nonempty [Nonempty α] : Nonempty (↥(Set.univ : Set α)) := Set.univ_nonempty.to_subtype #align set.univ.nonempty Set.univ.nonempty theorem nonempty_of_nonempty_subtype [Nonempty (↥s)] : s.Nonempty := nonempty_subtype.mp ‹_› #align set.nonempty_of_nonempty_subtype Set.nonempty_of_nonempty_subtype theorem empty_def : (∅ : Set α) = { _x : α \| False } := rfl #align set.empty_def Set.empty_def @[simp] theorem mem_empty_iff_false (x : α) : x ∈ (∅ : Set α) ↔ False := Iff.rfl #align set.mem_empty_iff_false Set.mem_empty_iff_false @[simp] theorem setOf_false : { _a : α \| False } = ∅ := rfl #align set.set_of_false Set.setOf_false @[simp] theorem setOf_bot : { _x : α \| ⊥ } = ∅ := rfl @[simp] theorem empty_subset (s : Set α) : ∅ ⊆ s := nofun #align set.empty_subset Set.empty_subset theorem subset_empty_iff {s : Set α} : s ⊆ ∅ ↔ s = ∅ := (Subset.antisymm_iff.trans <\| and_iff_left (empty_subset _)).symm #align set.subset_empty_iff Set.subset_empty_iff theorem eq_empty_iff_forall_not_mem {s : Set α} : s = ∅ ↔ ∀ x, x ∉ s := subset_empty_iff.symm #align set.eq_empty_iff_forall_not_mem Set.eq_empty_iff_forall_not_mem theorem eq_empty_of_forall_not_mem (h : ∀ x, x ∉ s) : s = ∅ := subset_empty_iff.1 h #align set.eq_empty_of_forall_not_mem Set.eq_empty_of_forall_not_mem theorem eq_empty_of_subset_empty {s : Set α} : s ⊆ ∅ → s = ∅ := subset_empty_iff.1 #align set.eq_empty_of_subset_empty Set.eq_empty_of_subset_empty theorem eq_empty_of_isEmpty [IsEmpty α] (s : Set α) : s = ∅ := eq_empty_of_subset_empty fun x _ => isEmptyElim x #align set.eq_empty_of_is_empty Set.eq_empty_of_isEmpty instance uniqueEmpty [IsEmpty α] : Unique (Set α) where default := ∅ uniq := eq_empty_of_isEmpty #align set.unique_empty Set.uniqueEmpty theorem not_nonempty_iff_eq_empty {s : Set α} : ¬s.Nonempty ↔ s = ∅ := by simp only [Set.Nonempty, not_exists, eq_empty_iff_forall_not_mem] #align set.not_nonempty_iff_eq_empty Set.not_nonempty_iff_eq_empty theorem nonempty_iff_ne_empty : s.Nonempty ↔ s ≠ ∅ := not_nonempty_iff_eq_empty.not_right #align set.nonempty_iff_ne_empty Set.nonempty_iff_ne_empty theorem not_nonempty_iff_eq_empty' : ¬Nonempty s ↔ s = ∅ := by rw [nonempty_subtype, not_exists, eq_empty_iff_forall_not_mem] theorem nonempty_iff_ne_empty' : Nonempty s ↔ s ≠ ∅ := not_nonempty_iff_eq_empty'.not_right alias ⟨Nonempty.ne_empty, _⟩ := nonempty_iff_ne_empty #align set.nonempty.ne_empty Set.Nonempty.ne_empty @[simp] theorem not_nonempty_empty : ¬(∅ : Set α).Nonempty := fun ⟨_, hx⟩ => hx #align set.not_nonempty_empty Set.not_nonempty_empty -- Porting note: removing `@[simp]` as it is competing with `isEmpty_subtype`. -- @[simp] theorem isEmpty_coe_sort {s : Set α} : IsEmpty (↥s) ↔ s = ∅ := not_iff_not.1 <\| by simpa using nonempty_iff_ne_empty #align set.is_empty_coe_sort Set.isEmpty_coe_sort theorem eq_empty_or_nonempty (s : Set α) : s = ∅ ∨ s.Nonempty := or_iff_not_imp_left.2 nonempty_iff_ne_empty.2 #align set.eq_empty_or_nonempty Set.eq_empty_or_nonempty theorem subset_eq_empty {s t : Set α} (h : t ⊆ s) (e : s = ∅) : t = ∅ := subset_empty_iff.1 <\| e ▸ h #align set.subset_eq_empty Set.subset_eq_empty theorem forall_mem_empty {p : α → Prop} : (∀ x ∈ (∅ : Set α), p x) ↔ True := iff_true_intro fun _ => False.elim #align set.ball_empty_iff Set.forall_mem_empty @[deprecated (since := "2024-03-23")] alias ball_empty_iff := forall_mem_empty instance (α : Type u) : IsEmpty.{u + 1} (↥(∅ : Set α)) := ⟨fun x => x.2⟩ @[simp] theorem empty_ssubset : ∅ ⊂ s ↔ s.Nonempty := (@bot_lt_iff_ne_bot (Set α) _ _ _).trans nonempty_iff_ne_empty.symm #align set.empty_ssubset Set.empty_ssubset alias ⟨_, Nonempty.empty_ssubset⟩ := empty_ssubset #align set.nonempty.empty_ssubset Set.Nonempty.empty_ssubset @[simp] theorem setOf_true : { _x : α \| True } = univ := rfl #align set.set_of_true Set.setOf_true @[simp] theorem setOf_top : { _x : α \| ⊤ } = univ := rfl @[simp] theorem univ_eq_empty_iff : (univ : Set α) = ∅ ↔ IsEmpty α := eq_empty_iff_forall_not_mem.trans ⟨fun H => ⟨fun x => H x trivial⟩, fun H x _ => @IsEmpty.false α H x⟩ #align set.univ_eq_empty_iff Set.univ_eq_empty_iff theorem empty_ne_univ [Nonempty α] : (∅ : Set α) ≠ univ := fun e => not_isEmpty_of_nonempty α <\| univ_eq_empty_iff.1 e.symm #align set.empty_ne_univ Set.empty_ne_univ @[simp] theorem subset_univ (s : Set α) : s ⊆ univ := fun _ _ => trivial #align set.subset_univ Set.subset_univ @[simp] theorem univ_subset_iff {s : Set α} : univ ⊆ s ↔ s = univ := @top_le_iff _ _ _ s #align set.univ_subset_iff Set.univ_subset_iff alias ⟨eq_univ_of_univ_subset, _⟩ := univ_subset_iff #align set.eq_univ_of_univ_subset Set.eq_univ_of_univ_subset theorem eq_univ_iff_forall {s : Set α} : s = univ ↔ ∀ x, x ∈ s := univ_subset_iff.symm.trans <\| forall_congr' fun _ => imp_iff_right trivial #align set.eq_univ_iff_forall Set.eq_univ_iff_forall theorem eq_univ_of_forall {s : Set α} : (∀ x, x ∈ s) → s = univ := eq_univ_iff_forall.2 #align set.eq_univ_of_forall Set.eq_univ_of_forall theorem Nonempty.eq_univ [Subsingleton α] : s.Nonempty → s = univ := by rintro ⟨x, hx⟩ exact eq_univ_of_forall fun y => by rwa [Subsingleton.elim y x] #align set.nonempty.eq_univ Set.Nonempty.eq_univ theorem eq_univ_of_subset {s t : Set α} (h : s ⊆ t) (hs : s = univ) : t = univ := eq_univ_of_univ_subset <\| (hs ▸ h : univ ⊆ t) #align set.eq_univ_of_subset Set.eq_univ_of_subset theorem exists_mem_of_nonempty (α) : ∀ [Nonempty α], ∃ x : α, x ∈ (univ : Set α) \| ⟨x⟩ => ⟨x, trivial⟩ #align set.exists_mem_of_nonempty Set.exists_mem_of_nonempty theorem ne_univ_iff_exists_not_mem {α : Type} (s : Set α) : s ≠ univ ↔ ∃ a, a ∉ s := by rw [← not_forall, ← eq_univ_iff_forall] #align set.ne_univ_iff_exists_not_mem Set.ne_univ_iff_exists_not_mem theorem not_subset_iff_exists_mem_not_mem {α : Type} {s t : Set α} : ¬s ⊆ t ↔ ∃ x, x ∈ s ∧ x ∉ t := by simp [subset_def] #align set.not_subset_iff_exists_mem_not_mem Set.not_subset_iff_exists_mem_not_mem theorem univ_unique [Unique α] : @Set.univ α = {default} := Set.ext fun x => iff_of_true trivial <\| Subsingleton.elim x default #align set.univ_unique Set.univ_unique theorem ssubset_univ_iff : s ⊂ univ ↔ s ≠ univ := lt_top_iff_ne_top #align set.ssubset_univ_iff Set.ssubset_univ_iff instance nontrivial_of_nonempty [Nonempty α] : Nontrivial (Set α) := ⟨⟨∅, univ, empty_ne_univ⟩⟩ #align set.nontrivial_of_nonempty Set.nontrivial_of_nonempty theorem union_def {s₁ s₂ : Set α} : s₁ ∪ s₂ = { a \| a ∈ s₁ ∨ a ∈ s₂ } := rfl #align set.union_def Set.union_def theorem mem_union_left {x : α} {a : Set α} (b : Set α) : x ∈ a → x ∈ a ∪ b := Or.inl #align set.mem_union_left Set.mem_union_left theorem mem_union_right {x : α} {b : Set α} (a : Set α) : x ∈ b → x ∈ a ∪ b := Or.inr #align set.mem_union_right Set.mem_union_right theorem mem_or_mem_of_mem_union {x : α} {a b : Set α} (H : x ∈ a ∪ b) : x ∈ a ∨ x ∈ b := H #align set.mem_or_mem_of_mem_union Set.mem_or_mem_of_mem_union theorem MemUnion.elim {x : α} {a b : Set α} {P : Prop} (H₁ : x ∈ a ∪ b) (H₂ : x ∈ a → P) (H₃ : x ∈ b → P) : P := Or.elim H₁ H₂ H₃ #align set.mem_union.elim Set.MemUnion.elim @[simp] theorem mem_union (x : α) (a b : Set α) : x ∈ a ∪ b ↔ x ∈ a ∨ x ∈ b := Iff.rfl #align set.mem_union Set.mem_union @[simp] theorem union_self (a : Set α) : a ∪ a = a := ext fun _ => or_self_iff #align set.union_self Set.union_self @[simp] theorem union_empty (a : Set α) : a ∪ ∅ = a := ext fun _ => or_false_iff _ #align set.union_empty Set.union_empty @[simp] theorem empty_union (a : Set α) : ∅ ∪ a = a := ext fun _ => false_or_iff _ #align set.empty_union Set.empty_union theorem union_comm (a b : Set α) : a ∪ b = b ∪ a := ext fun _ => or_comm #align set.union_comm Set.union_comm theorem union_assoc (a b c : Set α) : a ∪ b ∪ c = a ∪ (b ∪ c) := ext fun _ => or_assoc #align set.union_assoc Set.union_assoc instance union_isAssoc : Std.Associative (α := Set α) (· ∪ ·) := ⟨union_assoc⟩ #align set.union_is_assoc Set.union_isAssoc instance union_isComm : Std.Commutative (α := Set α) (· ∪ ·) := ⟨union_comm⟩ #align set.union_is_comm Set.union_isComm theorem union_left_comm (s₁ s₂ s₃ : Set α) : s₁ ∪ (s₂ ∪ s₃) = s₂ ∪ (s₁ ∪ s₃) := ext fun _ => or_left_comm #align set.union_left_comm Set.union_left_comm theorem union_right_comm (s₁ s₂ s₃ : Set α) : s₁ ∪ s₂ ∪ s₃ = s₁ ∪ s₃ ∪ s₂ := ext fun _ => or_right_comm #align set.union_right_comm Set.union_right_comm @[simp] theorem union_eq_left {s t : Set α} : s ∪ t = s ↔ t ⊆ s := sup_eq_left #align set.union_eq_left_iff_subset Set.union_eq_left @[simp] theorem union_eq_right {s t : Set α} : s ∪ t = t ↔ s ⊆ t := sup_eq_right #align set.union_eq_right_iff_subset Set.union_eq_right theorem union_eq_self_of_subset_left {s t : Set α} (h : s ⊆ t) : s ∪ t = t := union_eq_right.mpr h #align set.union_eq_self_of_subset_left Set.union_eq_self_of_subset_left theorem union_eq_self_of_subset_right {s t : Set α} (h : t ⊆ s) : s ∪ t = s := union_eq_left.mpr h #align set.union_eq_self_of_subset_right Set.union_eq_self_of_subset_right @[simp] theorem subset_union_left {s t : Set α} : s ⊆ s ∪ t := fun _ => Or.inl #align set.subset_union_left Set.subset_union_left @[simp] theorem subset_union_right {s t : Set α} : t ⊆ s ∪ t := fun _ => Or.inr #align set.subset_union_right Set.subset_union_right theorem union_subset {s t r : Set α} (sr : s ⊆ r) (tr : t ⊆ r) : s ∪ t ⊆ r := fun _ => Or.rec (@sr _) (@tr _) #align set.union_subset Set.union_subset @[simp] theorem union_subset_iff {s t u : Set α} : s ∪ t ⊆ u ↔ s ⊆ u ∧ t ⊆ u := (forall_congr' fun _ => or_imp).trans forall_and #align set.union_subset_iff Set.union_subset_iff @[gcongr] theorem union_subset_union {s₁ s₂ t₁ t₂ : Set α} (h₁ : s₁ ⊆ s₂) (h₂ : t₁ ⊆ t₂) : s₁ ∪ t₁ ⊆ s₂ ∪ t₂ := fun _ => Or.imp (@h₁ _) (@h₂ _) #align set.union_subset_union Set.union_subset_union @[gcongr] theorem union_subset_union_left {s₁ s₂ : Set α} (t) (h : s₁ ⊆ s₂) : s₁ ∪ t ⊆ s₂ ∪ t := union_subset_union h Subset.rfl #align set.union_subset_union_left Set.union_subset_union_left @[gcongr] theorem union_subset_union_right (s) {t₁ t₂ : Set α} (h : t₁ ⊆ t₂) : s ∪ t₁ ⊆ s ∪ t₂ := union_subset_union Subset.rfl h #align set.union_subset_union_right Set.union_subset_union_right theorem subset_union_of_subset_left {s t : Set α} (h : s ⊆ t) (u : Set α) : s ⊆ t ∪ u := h.trans subset_union_left #align set.subset_union_of_subset_left Set.subset_union_of_subset_left theorem subset_union_of_subset_right {s u : Set α} (h : s ⊆ u) (t : Set α) : s ⊆ t ∪ u := h.trans subset_union_right #align set.subset_union_of_subset_right Set.subset_union_of_subset_right -- Porting note: replaced `⊔` in RHS theorem union_congr_left (ht : t ⊆ s ∪ u) (hu : u ⊆ s ∪ t) : s ∪ t = s ∪ u := sup_congr_left ht hu #align set.union_congr_left Set.union_congr_left theorem union_congr_right (hs : s ⊆ t ∪ u) (ht : t ⊆ s ∪ u) : s ∪ u = t ∪ u := sup_congr_right hs ht #align set.union_congr_right Set.union_congr_right theorem union_eq_union_iff_left : s ∪ t = s ∪ u ↔ t ⊆ s ∪ u ∧ u ⊆ s ∪ t := sup_eq_sup_iff_left #align set.union_eq_union_iff_left Set.union_eq_union_iff_left theorem union_eq_union_iff_right : s ∪ u = t ∪ u ↔ s ⊆ t ∪ u ∧ t ⊆ s ∪ u := sup_eq_sup_iff_right #align set.union_eq_union_iff_right Set.union_eq_union_iff_right @[simp] theorem union_empty_iff {s t : Set α} : s ∪ t = ∅ ↔ s = ∅ ∧ t = ∅ := by simp only [← subset_empty_iff] exact union_subset_iff #align set.union_empty_iff Set.union_empty_iff @[simp] theorem union_univ (s : Set α) : s ∪ univ = univ := sup_top_eq _ #align set.union_univ Set.union_univ @[simp] theorem univ_union (s : Set α) : univ ∪ s = univ := top_sup_eq _ #align set.univ_union Set.univ_union theorem inter_def {s₁ s₂ : Set α} : s₁ ∩ s₂ = { a \| a ∈ s₁ ∧ a ∈ s₂ } := rfl #align set.inter_def Set.inter_def @[simp, mfld_simps] theorem mem_inter_iff (x : α) (a b : Set α) : x ∈ a ∩ b ↔ x ∈ a ∧ x ∈ b := Iff.rfl #align set.mem_inter_iff Set.mem_inter_iff theorem mem_inter {x : α} {a b : Set α} (ha : x ∈ a) (hb : x ∈ b) : x ∈ a ∩ b := ⟨ha, hb⟩ #align set.mem_inter Set.mem_inter theorem mem_of_mem_inter_left {x : α} {a b : Set α} (h : x ∈ a ∩ b) : x ∈ a := h.left #align set.mem_of_mem_inter_left Set.mem_of_mem_inter_left theorem mem_of_mem_inter_right {x : α} {a b : Set α} (h : x ∈ a ∩ b) : x ∈ b := h.right #align set.mem_of_mem_inter_right Set.mem_of_mem_inter_right @[simp] theorem inter_self (a : Set α) : a ∩ a = a := ext fun _ => and_self_iff #align set.inter_self Set.inter_self @[simp] theorem inter_empty (a : Set α) : a ∩ ∅ = ∅ := ext fun _ => and_false_iff _ #align set.inter_empty Set.inter_empty @[simp] theorem empty_inter (a : Set α) : ∅ ∩ a = ∅ := ext fun _ => false_and_iff _ #align set.empty_inter Set.empty_inter theorem inter_comm (a b : Set α) : a ∩ b = b ∩ a := ext fun _ => and_comm #align set.inter_comm Set.inter_comm theorem inter_assoc (a b c : Set α) : a ∩ b ∩ c = a ∩ (b ∩ c) := ext fun _ => and_assoc #align set.inter_assoc Set.inter_assoc instance inter_isAssoc : Std.Associative (α := Set α) (· ∩ ·) := ⟨inter_assoc⟩ #align set.inter_is_assoc Set.inter_isAssoc instance inter_isComm : Std.Commutative (α := Set α) (· ∩ ·) := ⟨inter_comm⟩ #align set.inter_is_comm Set.inter_isComm theorem inter_left_comm (s₁ s₂ s₃ : Set α) : s₁ ∩ (s₂ ∩ s₃) = s₂ ∩ (s₁ ∩ s₃) := ext fun _ => and_left_comm #align set.inter_left_comm Set.inter_left_comm theorem inter_right_comm (s₁ s₂ s₃ : Set α) : s₁ ∩ s₂ ∩ s₃ = s₁ ∩ s₃ ∩ s₂ := ext fun _ => and_right_comm #align set.inter_right_comm Set.inter_right_comm @[simp, mfld_simps] theorem inter_subset_left {s t : Set α} : s ∩ t ⊆ s := fun _ => And.left #align set.inter_subset_left Set.inter_subset_left @[simp] theorem inter_subset_right {s t : Set α} : s ∩ t ⊆ t := fun _ => And.right #align set.inter_subset_right Set.inter_subset_right theorem subset_inter {s t r : Set α} (rs : r ⊆ s) (rt : r ⊆ t) : r ⊆ s ∩ t := fun _ h => ⟨rs h, rt h⟩ #align set.subset_inter Set.subset_inter @[simp] theorem subset_inter_iff {s t r : Set α} : r ⊆ s ∩ t ↔ r ⊆ s ∧ r ⊆ t := (forall_congr' fun _ => imp_and).trans forall_and #align set.subset_inter_iff Set.subset_inter_iff @[simp] lemma inter_eq_left : s ∩ t = s ↔ s ⊆ t := inf_eq_left #align set.inter_eq_left_iff_subset Set.inter_eq_left @[simp] lemma inter_eq_right : s ∩ t = t ↔ t ⊆ s := inf_eq_right #align set.inter_eq_right_iff_subset Set.inter_eq_right @[simp] lemma left_eq_inter : s = s ∩ t ↔ s ⊆ t := left_eq_inf @[simp] lemma right_eq_inter : t = s ∩ t ↔ t ⊆ s := right_eq_inf theorem inter_eq_self_of_subset_left {s t : Set α} : s ⊆ t → s ∩ t = s := inter_eq_left.mpr #align set.inter_eq_self_of_subset_left Set.inter_eq_self_of_subset_left theorem inter_eq_self_of_subset_right {s t : Set α} : t ⊆ s → s ∩ t = t := inter_eq_right.mpr #align set.inter_eq_self_of_subset_right Set.inter_eq_self_of_subset_right theorem inter_congr_left (ht : s ∩ u ⊆ t) (hu : s ∩ t ⊆ u) : s ∩ t = s ∩ u := inf_congr_left ht hu #align set.inter_congr_left Set.inter_congr_left theorem inter_congr_right (hs : t ∩ u ⊆ s) (ht : s ∩ u ⊆ t) : s ∩ u = t ∩ u := inf_congr_right hs ht #align set.inter_congr_right Set.inter_congr_right theorem inter_eq_inter_iff_left : s ∩ t = s ∩ u ↔ s ∩ u ⊆ t ∧ s ∩ t ⊆ u := inf_eq_inf_iff_left #align set.inter_eq_inter_iff_left Set.inter_eq_inter_iff_left theorem inter_eq_inter_iff_right : s ∩ u = t ∩ u ↔ t ∩ u ⊆ s ∧ s ∩ u ⊆ t := inf_eq_inf_iff_right #align set.inter_eq_inter_iff_right Set.inter_eq_inter_iff_right @[simp, mfld_simps] theorem inter_univ (a : Set α) : a ∩ univ = a := inf_top_eq _ #align set.inter_univ Set.inter_univ @[simp, mfld_simps] theorem univ_inter (a : Set α) : univ ∩ a = a := top_inf_eq _ #align set.univ_inter Set.univ_inter @[gcongr] theorem inter_subset_inter {s₁ s₂ t₁ t₂ : Set α} (h₁ : s₁ ⊆ t₁) (h₂ : s₂ ⊆ t₂) : s₁ ∩ s₂ ⊆ t₁ ∩ t₂ := fun _ => And.imp (@h₁ _) (@h₂ _) #align set.inter_subset_inter Set.inter_subset_inter @[gcongr] theorem inter_subset_inter_left {s t : Set α} (u : Set α) (H : s ⊆ t) : s ∩ u ⊆ t ∩ u := inter_subset_inter H Subset.rfl #align set.inter_subset_inter_left Set.inter_subset_inter_left @[gcongr] theorem inter_subset_inter_right {s t : Set α} (u : Set α) (H : s ⊆ t) : u ∩ s ⊆ u ∩ t := inter_subset_inter Subset.rfl H #align set.inter_subset_inter_right Set.inter_subset_inter_right theorem union_inter_cancel_left {s t : Set α} : (s ∪ t) ∩ s = s := inter_eq_self_of_subset_right subset_union_left #align set.union_inter_cancel_left Set.union_inter_cancel_left theorem union_inter_cancel_right {s t : Set α} : (s ∪ t) ∩ t = t := inter_eq_self_of_subset_right subset_union_right #align set.union_inter_cancel_right Set.union_inter_cancel_right theorem inter_setOf_eq_sep (s : Set α) (p : α → Prop) : s ∩ {a \| p a} = {a ∈ s \| p a} := rfl #align set.inter_set_of_eq_sep Set.inter_setOf_eq_sep theorem setOf_inter_eq_sep (p : α → Prop) (s : Set α) : {a \| p a} ∩ s = {a ∈ s \| p a} := inter_comm _ _ #align set.set_of_inter_eq_sep Set.setOf_inter_eq_sep theorem inter_union_distrib_left (s t u : Set α) : s ∩ (t ∪ u) = s ∩ t ∪ s ∩ u := inf_sup_left _ _ _ #align set.inter_distrib_left Set.inter_union_distrib_left theorem union_inter_distrib_right (s t u : Set α) : (s ∪ t) ∩ u = s ∩ u ∪ t ∩ u := inf_sup_right _ _ _ #align set.inter_distrib_right Set.union_inter_distrib_right theorem union_inter_distrib_left (s t u : Set α) : s ∪ t ∩ u = (s ∪ t) ∩ (s ∪ u) := sup_inf_left _ _ _ #align set.union_distrib_left Set.union_inter_distrib_left theorem inter_union_distrib_right (s t u : Set α) : s ∩ t ∪ u = (s ∪ u) ∩ (t ∪ u) := sup_inf_right _ _ _ #align set.union_distrib_right Set.inter_union_distrib_right -- 2024-03-22 @[deprecated] alias inter_distrib_left := inter_union_distrib_left @[deprecated] alias inter_distrib_right := union_inter_distrib_right @[deprecated] alias union_distrib_left := union_inter_distrib_left @[deprecated] alias union_distrib_right := inter_union_distrib_right theorem union_union_distrib_left (s t u : Set α) : s ∪ (t ∪ u) = s ∪ t ∪ (s ∪ u) := sup_sup_distrib_left _ _ _ #align set.union_union_distrib_left Set.union_union_distrib_left theorem union_union_distrib_right (s t u : Set α) : s ∪ t ∪ u = s ∪ u ∪ (t ∪ u) := sup_sup_distrib_right _ _ _ #align set.union_union_distrib_right Set.union_union_distrib_right theorem inter_inter_distrib_left (s t u : Set α) : s ∩ (t ∩ u) = s ∩ t ∩ (s ∩ u) := inf_inf_distrib_left _ _ _ #align set.inter_inter_distrib_left Set.inter_inter_distrib_left theorem inter_inter_distrib_right (s t u : Set α) : s ∩ t ∩ u = s ∩ u ∩ (t ∩ u) := inf_inf_distrib_right _ _ _ #align set.inter_inter_distrib_right Set.inter_inter_distrib_right theorem union_union_union_comm (s t u v : Set α) : s ∪ t ∪ (u ∪ v) = s ∪ u ∪ (t ∪ v) := sup_sup_sup_comm _ _ _ _ #align set.union_union_union_comm Set.union_union_union_comm theorem inter_inter_inter_comm (s t u v : Set α) : s ∩ t ∩ (u ∩ v) = s ∩ u ∩ (t ∩ v) := inf_inf_inf_comm _ _ _ _ #align set.inter_inter_inter_comm Set.inter_inter_inter_comm theorem insert_def (x : α) (s : Set α) : insert x s = { y \| y = x ∨ y ∈ s } := rfl #align set.insert_def Set.insert_def @[simp] theorem subset_insert (x : α) (s : Set α) : s ⊆ insert x s := fun _ => Or.inr #align set.subset_insert Set.subset_insert theorem mem_insert (x : α) (s : Set α) : x ∈ insert x s := Or.inl rfl #align set.mem_insert Set.mem_insert theorem mem_insert_of_mem {x : α} {s : Set α} (y : α) : x ∈ s → x ∈ insert y s := Or.inr #align set.mem_insert_of_mem Set.mem_insert_of_mem theorem eq_or_mem_of_mem_insert {x a : α} {s : Set α} : x ∈ insert a s → x = a ∨ x ∈ s := id #align set.eq_or_mem_of_mem_insert Set.eq_or_mem_of_mem_insert theorem mem_of_mem_insert_of_ne : b ∈ insert a s → b ≠ a → b ∈ s := Or.resolve_left #align set.mem_of_mem_insert_of_ne Set.mem_of_mem_insert_of_ne theorem eq_of_not_mem_of_mem_insert : b ∈ insert a s → b ∉ s → b = a := Or.resolve_right #align set.eq_of_not_mem_of_mem_insert Set.eq_of_not_mem_of_mem_insert @[simp] theorem mem_insert_iff {x a : α} {s : Set α} : x ∈ insert a s ↔ x = a ∨ x ∈ s := Iff.rfl #align set.mem_insert_iff Set.mem_insert_iff @[simp] theorem insert_eq_of_mem {a : α} {s : Set α} (h : a ∈ s) : insert a s = s := ext fun _ => or_iff_right_of_imp fun e => e.symm ▸ h #align set.insert_eq_of_mem Set.insert_eq_of_mem theorem ne_insert_of_not_mem {s : Set α} (t : Set α) {a : α} : a ∉ s → s ≠ insert a t := mt fun e => e.symm ▸ mem_insert _ _ #align set.ne_insert_of_not_mem Set.ne_insert_of_not_mem @[simp] theorem insert_eq_self : insert a s = s ↔ a ∈ s := ⟨fun h => h ▸ mem_insert _ _, insert_eq_of_mem⟩ #align set.insert_eq_self Set.insert_eq_self theorem insert_ne_self : insert a s ≠ s ↔ a ∉ s := insert_eq_self.not #align set.insert_ne_self Set.insert_ne_self theorem insert_subset_iff : insert a s ⊆ t ↔ a ∈ t ∧ s ⊆ t := by simp only [subset_def, mem_insert_iff, or_imp, forall_and, forall_eq] #align set.insert_subset Set.insert_subset_iff theorem insert_subset (ha : a ∈ t) (hs : s ⊆ t) : insert a s ⊆ t := insert_subset_iff.mpr ⟨ha, hs⟩ theorem insert_subset_insert (h : s ⊆ t) : insert a s ⊆ insert a t := fun _ => Or.imp_right (@h _) #align set.insert_subset_insert Set.insert_subset_insert @[simp] theorem insert_subset_insert_iff (ha : a ∉ s) : insert a s ⊆ insert a t ↔ s ⊆ t := by refine ⟨fun h x hx => ?_, insert_subset_insert⟩ rcases h (subset_insert _ _ hx) with (rfl \| hxt) exacts [(ha hx).elim, hxt] #align set.insert_subset_insert_iff Set.insert_subset_insert_iff theorem subset_insert_iff_of_not_mem (ha : a ∉ s) : s ⊆ insert a t ↔ s ⊆ t := forall₂_congr fun _ hb => or_iff_right <\| ne_of_mem_of_not_mem hb ha #align set.subset_insert_iff_of_not_mem Set.subset_insert_iff_of_not_mem theorem ssubset_iff_insert {s t : Set α} : s ⊂ t ↔ ∃ a ∉ s, insert a s ⊆ t := by simp only [insert_subset_iff, exists_and_right, ssubset_def, not_subset] aesop #align set.ssubset_iff_insert Set.ssubset_iff_insert theorem ssubset_insert {s : Set α} {a : α} (h : a ∉ s) : s ⊂ insert a s := ssubset_iff_insert.2 ⟨a, h, Subset.rfl⟩ #align set.ssubset_insert Set.ssubset_insert theorem insert_comm (a b : α) (s : Set α) : insert a (insert b s) = insert b (insert a s) := ext fun _ => or_left_comm #align set.insert_comm Set.insert_comm -- Porting note (#10618): removing `simp` attribute because `simp` can prove it theorem insert_idem (a : α) (s : Set α) : insert a (insert a s) = insert a s := insert_eq_of_mem <\| mem_insert _ _ #align set.insert_idem Set.insert_idem theorem insert_union : insert a s ∪ t = insert a (s ∪ t) := ext fun _ => or_assoc #align set.insert_union Set.insert_union @[simp] theorem union_insert : s ∪ insert a t = insert a (s ∪ t) := ext fun _ => or_left_comm #align set.union_insert Set.union_insert @[simp] theorem insert_nonempty (a : α) (s : Set α) : (insert a s).Nonempty := ⟨a, mem_insert a s⟩ #align set.insert_nonempty Set.insert_nonempty instance (a : α) (s : Set α) : Nonempty (insert a s : Set α) := (insert_nonempty a s).to_subtype theorem insert_inter_distrib (a : α) (s t : Set α) : insert a (s ∩ t) = insert a s ∩ insert a t := ext fun _ => or_and_left #align set.insert_inter_distrib Set.insert_inter_distrib theorem insert_union_distrib (a : α) (s t : Set α) : insert a (s ∪ t) = insert a s ∪ insert a t := ext fun _ => or_or_distrib_left #align set.insert_union_distrib Set.insert_union_distrib theorem insert_inj (ha : a ∉ s) : insert a s = insert b s ↔ a = b := ⟨fun h => eq_of_not_mem_of_mem_insert (h.subst <\| mem_insert a s) ha, congr_arg (fun x => insert x s)⟩ #align set.insert_inj Set.insert_inj -- useful in proofs by induction theorem forall_of_forall_insert {P : α → Prop} {a : α} {s : Set α} (H : ∀ x, x ∈ insert a s → P x) (x) (h : x ∈ s) : P x := H _ (Or.inr h) #align set.forall_of_forall_insert Set.forall_of_forall_insert theorem forall_insert_of_forall {P : α → Prop} {a : α} {s : Set α} (H : ∀ x, x ∈ s → P x) (ha : P a) (x) (h : x ∈ insert a s) : P x := h.elim (fun e => e.symm ▸ ha) (H _) #align set.forall_insert_of_forall Set.forall_insert_of_forall theorem exists_mem_insert {P : α → Prop} {a : α} {s : Set α} : (∃ x ∈ insert a s, P x) ↔ (P a ∨ ∃ x ∈ s, P x) := by simp [mem_insert_iff, or_and_right, exists_and_left, exists_or] #align set.bex_insert_iff Set.exists_mem_insert @[deprecated (since := "2024-03-23")] alias bex_insert_iff := exists_mem_insert theorem forall_mem_insert {P : α → Prop} {a : α} {s : Set α} : (∀ x ∈ insert a s, P x) ↔ P a ∧ ∀ x ∈ s, P x := forall₂_or_left.trans <\| and_congr_left' forall_eq #align set.ball_insert_iff Set.forall_mem_insert @[deprecated (since := "2024-03-23")] alias ball_insert_iff := forall_mem_insert instance : LawfulSingleton α (Set α) := ⟨fun x => Set.ext fun a => by simp only [mem_empty_iff_false, mem_insert_iff, or_false] exact Iff.rfl⟩ theorem singleton_def (a : α) : ({a} : Set α) = insert a ∅ := (insert_emptyc_eq a).symm #align set.singleton_def Set.singleton_def @[simp] theorem mem_singleton_iff {a b : α} : a ∈ ({b} : Set α) ↔ a = b := Iff.rfl #align set.mem_singleton_iff Set.mem_singleton_iff @[simp] theorem setOf_eq_eq_singleton {a : α} : { n \| n = a } = {a} := rfl #align set.set_of_eq_eq_singleton Set.setOf_eq_eq_singleton @[simp] theorem setOf_eq_eq_singleton' {a : α} : { x \| a = x } = {a} := ext fun _ => eq_comm #align set.set_of_eq_eq_singleton' Set.setOf_eq_eq_singleton' -- TODO: again, annotation needed --Porting note (#11119): removed `simp` attribute theorem mem_singleton (a : α) : a ∈ ({a} : Set α) := @rfl _ _ #align set.mem_singleton Set.mem_singleton theorem eq_of_mem_singleton {x y : α} (h : x ∈ ({y} : Set α)) : x = y := h #align set.eq_of_mem_singleton Set.eq_of_mem_singleton @[simp] theorem singleton_eq_singleton_iff {x y : α} : {x} = ({y} : Set α) ↔ x = y := ext_iff.trans eq_iff_eq_cancel_left #align set.singleton_eq_singleton_iff Set.singleton_eq_singleton_iff theorem singleton_injective : Injective (singleton : α → Set α) := fun _ _ => singleton_eq_singleton_iff.mp #align set.singleton_injective Set.singleton_injective theorem mem_singleton_of_eq {x y : α} (H : x = y) : x ∈ ({y} : Set α) := H #align set.mem_singleton_of_eq Set.mem_singleton_of_eq theorem insert_eq (x : α) (s : Set α) : insert x s = ({x} : Set α) ∪ s := rfl #align set.insert_eq Set.insert_eq @[simp] theorem singleton_nonempty (a : α) : ({a} : Set α).Nonempty := ⟨a, rfl⟩ #align set.singleton_nonempty Set.singleton_nonempty @[simp] theorem singleton_ne_empty (a : α) : ({a} : Set α) ≠ ∅ := (singleton_nonempty _).ne_empty #align set.singleton_ne_empty Set.singleton_ne_empty --Porting note (#10618): removed `simp` attribute because `simp` can prove it theorem empty_ssubset_singleton : (∅ : Set α) ⊂ {a} := (singleton_nonempty _).empty_ssubset #align set.empty_ssubset_singleton Set.empty_ssubset_singleton @[simp] theorem singleton_subset_iff {a : α} {s : Set α} : {a} ⊆ s ↔ a ∈ s := forall_eq #align set.singleton_subset_iff Set.singleton_subset_iff theorem singleton_subset_singleton : ({a} : Set α) ⊆ {b} ↔ a = b := by simp #align set.singleton_subset_singleton Set.singleton_subset_singleton theorem set_compr_eq_eq_singleton {a : α} : { b \| b = a } = {a} := rfl #align set.set_compr_eq_eq_singleton Set.set_compr_eq_eq_singleton @[simp] theorem singleton_union : {a} ∪ s = insert a s := rfl #align set.singleton_union Set.singleton_union @[simp] theorem union_singleton : s ∪ {a} = insert a s := union_comm _ _ #align set.union_singleton Set.union_singleton @[simp] theorem singleton_inter_nonempty : ({a} ∩ s).Nonempty ↔ a ∈ s := by simp only [Set.Nonempty, mem_inter_iff, mem_singleton_iff, exists_eq_left] #align set.singleton_inter_nonempty Set.singleton_inter_nonempty @[simp] theorem inter_singleton_nonempty : (s ∩ {a}).Nonempty ↔ a ∈ s := by rw [inter_comm, singleton_inter_nonempty] #align set.inter_singleton_nonempty Set.inter_singleton_nonempty @[simp] theorem singleton_inter_eq_empty : {a} ∩ s = ∅ ↔ a ∉ s := not_nonempty_iff_eq_empty.symm.trans singleton_inter_nonempty.not #align set.singleton_inter_eq_empty Set.singleton_inter_eq_empty @[simp] theorem inter_singleton_eq_empty : s ∩ {a} = ∅ ↔ a ∉ s := by rw [inter_comm, singleton_inter_eq_empty] #align set.inter_singleton_eq_empty Set.inter_singleton_eq_empty theorem nmem_singleton_empty {s : Set α} : s ∉ ({∅} : Set (Set α)) ↔ s.Nonempty := nonempty_iff_ne_empty.symm #align set.nmem_singleton_empty Set.nmem_singleton_empty instance uniqueSingleton (a : α) : Unique (↥({a} : Set α)) := ⟨⟨⟨a, mem_singleton a⟩⟩, fun ⟨_, h⟩ => Subtype.eq h⟩ #align set.unique_singleton Set.uniqueSingleton theorem eq_singleton_iff_unique_mem : s = {a} ↔ a ∈ s ∧ ∀ x ∈ s, x = a := Subset.antisymm_iff.trans <\| and_comm.trans <\| and_congr_left' singleton_subset_iff #align set.eq_singleton_iff_unique_mem Set.eq_singleton_iff_unique_mem theorem eq_singleton_iff_nonempty_unique_mem : s = {a} ↔ s.Nonempty ∧ ∀ x ∈ s, x = a := eq_singleton_iff_unique_mem.trans <\| and_congr_left fun H => ⟨fun h' => ⟨_, h'⟩, fun ⟨x, h⟩ => H x h ▸ h⟩ #align set.eq_singleton_iff_nonempty_unique_mem Set.eq_singleton_iff_nonempty_unique_mem set_option backward.synthInstance.canonInstances false in -- See https://github.com/leanprover-community/mathlib4/issues/12532 -- while `simp` is capable of proving this, it is not capable of turning the LHS into the RHS. @[simp] theorem default_coe_singleton (x : α) : (default : ({x} : Set α)) = ⟨x, rfl⟩ := rfl #align set.default_coe_singleton Set.default_coe_singleton @[simp] theorem subset_singleton_iff {α : Type} {s : Set α} {x : α} : s ⊆ {x} ↔ ∀ y ∈ s, y = x := Iff.rfl #align set.subset_singleton_iff Set.subset_singleton_iff theorem subset_singleton_iff_eq {s : Set α} {x : α} : s ⊆ {x} ↔ s = ∅ ∨ s = {x} := by obtain rfl \| hs := s.eq_empty_or_nonempty · exact ⟨fun _ => Or.inl rfl, fun _ => empty_subset _⟩ · simp [eq_singleton_iff_nonempty_unique_mem, hs, hs.ne_empty] #align set.subset_singleton_iff_eq Set.subset_singleton_iff_eq theorem Nonempty.subset_singleton_iff (h : s.Nonempty) : s ⊆ {a} ↔ s = {a} := subset_singleton_iff_eq.trans <\| or_iff_right h.ne_empty #align set.nonempty.subset_singleton_iff Set.Nonempty.subset_singleton_iff theorem ssubset_singleton_iff {s : Set α} {x : α} : s ⊂ {x} ↔ s = ∅ := by rw [ssubset_iff_subset_ne, subset_singleton_iff_eq, or_and_right, and_not_self_iff, or_false_iff, and_iff_left_iff_imp] exact fun h => h ▸ (singleton_ne_empty _).symm #align set.ssubset_singleton_iff Set.ssubset_singleton_iff theorem eq_empty_of_ssubset_singleton {s : Set α} {x : α} (hs : s ⊂ {x}) : s = ∅ := ssubset_singleton_iff.1 hs #align set.eq_empty_of_ssubset_singleton Set.eq_empty_of_ssubset_singleton theorem eq_of_nonempty_of_subsingleton {α} [Subsingleton α] (s t : Set α) [Nonempty s] [Nonempty t] : s = t := nonempty_of_nonempty_subtype.eq_univ.trans nonempty_of_nonempty_subtype.eq_univ.symm theorem eq_of_nonempty_of_subsingleton' {α} [Subsingleton α] {s : Set α} (t : Set α) (hs : s.Nonempty) [Nonempty t] : s = t := have := hs.to_subtype; eq_of_nonempty_of_subsingleton s t set_option backward.synthInstance.canonInstances false in -- See https://github.com/leanprover-community/mathlib4/issues/12532 theorem Nonempty.eq_zero [Subsingleton α] [Zero α] {s : Set α} (h : s.Nonempty) : s = {0} := eq_of_nonempty_of_subsingleton' {0} h set_option backward.synthInstance.canonInstances false in -- See https://github.com/leanprover-community/mathlib4/issues/12532 theorem Nonempty.eq_one [Subsingleton α] [One α] {s : Set α} (h : s.Nonempty) : s = {1} := eq_of_nonempty_of_subsingleton' {1} h protected theorem disjoint_iff : Disjoint s t ↔ s ∩ t ⊆ ∅ := disjoint_iff_inf_le #align set.disjoint_iff Set.disjoint_iff theorem disjoint_iff_inter_eq_empty : Disjoint s t ↔ s ∩ t = ∅ := disjoint_iff #align set.disjoint_iff_inter_eq_empty Set.disjoint_iff_inter_eq_empty theorem _root_.Disjoint.inter_eq : Disjoint s t → s ∩ t = ∅ := Disjoint.eq_bot #align disjoint.inter_eq Disjoint.inter_eq theorem disjoint_left : Disjoint s t ↔ ∀ ⦃a⦄, a ∈ s → a ∉ t := disjoint_iff_inf_le.trans <\| forall_congr' fun _ => not_and #align set.disjoint_left Set.disjoint_left theorem disjoint_right : Disjoint s t ↔ ∀ ⦃a⦄, a ∈ t → a ∉ s := by rw [disjoint_comm, disjoint_left] #align set.disjoint_right Set.disjoint_right lemma not_disjoint_iff : ¬Disjoint s t ↔ ∃ x, x ∈ s ∧ x ∈ t := Set.disjoint_iff.not.trans <\| not_forall.trans <\| exists_congr fun _ ↦ not_not #align set.not_disjoint_iff Set.not_disjoint_iff lemma not_disjoint_iff_nonempty_inter : ¬ Disjoint s t ↔ (s ∩ t).Nonempty := not_disjoint_iff #align set.not_disjoint_iff_nonempty_inter Set.not_disjoint_iff_nonempty_inter alias ⟨_, Nonempty.not_disjoint⟩ := not_disjoint_iff_nonempty_inter #align set.nonempty.not_disjoint Set.Nonempty.not_disjoint lemma disjoint_or_nonempty_inter (s t : Set α) : Disjoint s t ∨ (s ∩ t).Nonempty := (em _).imp_right not_disjoint_iff_nonempty_inter.1 #align set.disjoint_or_nonempty_inter Set.disjoint_or_nonempty_inter lemma disjoint_iff_forall_ne : Disjoint s t ↔ ∀ ⦃a⦄, a ∈ s → ∀ ⦃b⦄, b ∈ t → a ≠ b := by simp only [Ne, disjoint_left, @imp_not_comm _ (_ = _), forall_eq'] #align set.disjoint_iff_forall_ne Set.disjoint_iff_forall_ne alias ⟨_root_.Disjoint.ne_of_mem, _⟩ := disjoint_iff_forall_ne #align disjoint.ne_of_mem Disjoint.ne_of_mem lemma disjoint_of_subset_left (h : s ⊆ u) (d : Disjoint u t) : Disjoint s t := d.mono_left h #align set.disjoint_of_subset_left Set.disjoint_of_subset_left lemma disjoint_of_subset_right (h : t ⊆ u) (d : Disjoint s u) : Disjoint s t := d.mono_right h #align set.disjoint_of_subset_right Set.disjoint_of_subset_right lemma disjoint_of_subset (hs : s₁ ⊆ s₂) (ht : t₁ ⊆ t₂) (h : Disjoint s₂ t₂) : Disjoint s₁ t₁ := h.mono hs ht #align set.disjoint_of_subset Set.disjoint_of_subset @[simp] lemma disjoint_union_left : Disjoint (s ∪ t) u ↔ Disjoint s u ∧ Disjoint t u := disjoint_sup_left #align set.disjoint_union_left Set.disjoint_union_left @[simp] lemma disjoint_union_right : Disjoint s (t ∪ u) ↔ Disjoint s t ∧ Disjoint s u := disjoint_sup_right #align set.disjoint_union_right Set.disjoint_union_right @[simp] lemma disjoint_empty (s : Set α) : Disjoint s ∅ := disjoint_bot_right #align set.disjoint_empty Set.disjoint_empty @[simp] lemma empty_disjoint (s : Set α) : Disjoint ∅ s := disjoint_bot_left #align set.empty_disjoint Set.empty_disjoint @[simp] lemma univ_disjoint : Disjoint univ s ↔ s = ∅ := top_disjoint #align set.univ_disjoint Set.univ_disjoint @[simp] lemma disjoint_univ : Disjoint s univ ↔ s = ∅ := disjoint_top #align set.disjoint_univ Set.disjoint_univ lemma disjoint_sdiff_left : Disjoint (t \ s) s := disjoint_sdiff_self_left #align set.disjoint_sdiff_left Set.disjoint_sdiff_left lemma disjoint_sdiff_right : Disjoint s (t \ s) := disjoint_sdiff_self_right #align set.disjoint_sdiff_right Set.disjoint_sdiff_right -- TODO: prove this in terms of a lattice lemma theorem disjoint_sdiff_inter : Disjoint (s \ t) (s ∩ t) := disjoint_of_subset_right inter_subset_right disjoint_sdiff_left #align set.disjoint_sdiff_inter Set.disjoint_sdiff_inter theorem diff_union_diff_cancel (hts : t ⊆ s) (hut : u ⊆ t) : s \ t ∪ t \ u = s \ u := sdiff_sup_sdiff_cancel hts hut #align set.diff_union_diff_cancel Set.diff_union_diff_cancel theorem diff_diff_eq_sdiff_union (h : u ⊆ s) : s \ (t \ u) = s \ t ∪ u := sdiff_sdiff_eq_sdiff_sup h #align set.diff_diff_eq_sdiff_union Set.diff_diff_eq_sdiff_union @[simp default+1] lemma disjoint_singleton_left : Disjoint {a} s ↔ a ∉ s := by simp [Set.disjoint_iff, subset_def] #align set.disjoint_singleton_left Set.disjoint_singleton_left @[simp] lemma disjoint_singleton_right : Disjoint s {a} ↔ a ∉ s := disjoint_comm.trans disjoint_singleton_left #align set.disjoint_singleton_right Set.disjoint_singleton_right lemma disjoint_singleton : Disjoint ({a} : Set α) {b} ↔ a ≠ b := by simp #align set.disjoint_singleton Set.disjoint_singleton lemma subset_diff : s ⊆ t \ u ↔ s ⊆ t ∧ Disjoint s u := le_iff_subset.symm.trans le_sdiff #align set.subset_diff Set.subset_diff lemma ssubset_iff_sdiff_singleton : s ⊂ t ↔ ∃ a ∈ t, s ⊆ t \ {a} := by simp [ssubset_iff_insert, subset_diff, insert_subset_iff]; aesop theorem inter_diff_distrib_left (s t u : Set α) : s ∩ (t \ u) = (s ∩ t) \ (s ∩ u) := inf_sdiff_distrib_left _ _ _ #align set.inter_diff_distrib_left Set.inter_diff_distrib_left theorem inter_diff_distrib_right (s t u : Set α) : s \ t ∩ u = (s ∩ u) \ (t ∩ u) := inf_sdiff_distrib_right _ _ _ #align set.inter_diff_distrib_right Set.inter_diff_distrib_right theorem compl_def (s : Set α) : sᶜ = { x \| x ∉ s } := rfl #align set.compl_def Set.compl_def theorem mem_compl {s : Set α} {x : α} (h : x ∉ s) : x ∈ sᶜ := h #align set.mem_compl Set.mem_compl theorem compl_setOf {α} (p : α → Prop) : { a \| p a }ᶜ = { a \| ¬p a } := rfl #align set.compl_set_of Set.compl_setOf theorem not_mem_of_mem_compl {s : Set α} {x : α} (h : x ∈ sᶜ) : x ∉ s := h #align set.not_mem_of_mem_compl Set.not_mem_of_mem_compl theorem not_mem_compl_iff {x : α} : x ∉ sᶜ ↔ x ∈ s := not_not #align set.not_mem_compl_iff Set.not_mem_compl_iff @[simp] theorem inter_compl_self (s : Set α) : s ∩ sᶜ = ∅ := inf_compl_eq_bot #align set.inter_compl_self Set.inter_compl_self @[simp] theorem compl_inter_self (s : Set α) : sᶜ ∩ s = ∅ := compl_inf_eq_bot #align set.compl_inter_self Set.compl_inter_self @[simp] theorem compl_empty : (∅ : Set α)ᶜ = univ := compl_bot #align set.compl_empty Set.compl_empty @[simp] theorem compl_union (s t : Set α) : (s ∪ t)ᶜ = sᶜ ∩ tᶜ := compl_sup #align set.compl_union Set.compl_union theorem compl_inter (s t : Set α) : (s ∩ t)ᶜ = sᶜ ∪ tᶜ := compl_inf #align set.compl_inter Set.compl_inter @[simp] theorem compl_univ : (univ : Set α)ᶜ = ∅ := compl_top #align set.compl_univ Set.compl_univ @[simp] theorem compl_empty_iff {s : Set α} : sᶜ = ∅ ↔ s = univ := compl_eq_bot #align set.compl_empty_iff Set.compl_empty_iff @[simp] theorem compl_univ_iff {s : Set α} : sᶜ = univ ↔ s = ∅ := compl_eq_top #align set.compl_univ_iff Set.compl_univ_iff theorem compl_ne_univ : sᶜ ≠ univ ↔ s.Nonempty := compl_univ_iff.not.trans nonempty_iff_ne_empty.symm #align set.compl_ne_univ Set.compl_ne_univ theorem nonempty_compl : sᶜ.Nonempty ↔ s ≠ univ := (ne_univ_iff_exists_not_mem s).symm #align set.nonempty_compl Set.nonempty_compl @[simp] lemma nonempty_compl_of_nontrivial [Nontrivial α] (x : α) : Set.Nonempty {x}ᶜ := by obtain ⟨y, hy⟩ := exists_ne x exact ⟨y, by simp [hy]⟩ theorem mem_compl_singleton_iff {a x : α} : x ∈ ({a} : Set α)ᶜ ↔ x ≠ a := Iff.rfl #align set.mem_compl_singleton_iff Set.mem_compl_singleton_iff theorem compl_singleton_eq (a : α) : ({a} : Set α)ᶜ = { x \| x ≠ a } := rfl #align set.compl_singleton_eq Set.compl_singleton_eq @[simp] theorem compl_ne_eq_singleton (a : α) : ({ x \| x ≠ a } : Set α)ᶜ = {a} := compl_compl _ #align set.compl_ne_eq_singleton Set.compl_ne_eq_singleton theorem union_eq_compl_compl_inter_compl (s t : Set α) : s ∪ t = (sᶜ ∩ tᶜ)ᶜ := ext fun _ => or_iff_not_and_not #align set.union_eq_compl_compl_inter_compl Set.union_eq_compl_compl_inter_compl theorem inter_eq_compl_compl_union_compl (s t : Set α) : s ∩ t = (sᶜ ∪ tᶜ)ᶜ := ext fun _ => and_iff_not_or_not #align set.inter_eq_compl_compl_union_compl Set.inter_eq_compl_compl_union_compl @[simp] theorem union_compl_self (s : Set α) : s ∪ sᶜ = univ := eq_univ_iff_forall.2 fun _ => em _ #align set.union_compl_self Set.union_compl_self @[simp] theorem compl_union_self (s : Set α) : sᶜ ∪ s = univ := by rw [union_comm, union_compl_self] #align set.compl_union_self Set.compl_union_self theorem compl_subset_comm : sᶜ ⊆ t ↔ tᶜ ⊆ s := @compl_le_iff_compl_le _ s _ _ #align set.compl_subset_comm Set.compl_subset_comm theorem subset_compl_comm : s ⊆ tᶜ ↔ t ⊆ sᶜ := @le_compl_iff_le_compl _ _ _ t #align set.subset_compl_comm Set.subset_compl_comm @[simp] theorem compl_subset_compl : sᶜ ⊆ tᶜ ↔ t ⊆ s := @compl_le_compl_iff_le (Set α) _ _ _ #align set.compl_subset_compl Set.compl_subset_compl @[gcongr] theorem compl_subset_compl_of_subset (h : t ⊆ s) : sᶜ ⊆ tᶜ := compl_subset_compl.2 h theorem subset_compl_iff_disjoint_left : s ⊆ tᶜ ↔ Disjoint t s := @le_compl_iff_disjoint_left (Set α) _ _ _ #align set.subset_compl_iff_disjoint_left Set.subset_compl_iff_disjoint_left theorem subset_compl_iff_disjoint_right : s ⊆ tᶜ ↔ Disjoint s t := @le_compl_iff_disjoint_right (Set α) _ _ _ #align set.subset_compl_iff_disjoint_right Set.subset_compl_iff_disjoint_right theorem disjoint_compl_left_iff_subset : Disjoint sᶜ t ↔ t ⊆ s := disjoint_compl_left_iff #align set.disjoint_compl_left_iff_subset Set.disjoint_compl_left_iff_subset theorem disjoint_compl_right_iff_subset : Disjoint s tᶜ ↔ s ⊆ t := disjoint_compl_right_iff #align set.disjoint_compl_right_iff_subset Set.disjoint_compl_right_iff_subset alias ⟨_, _root_.Disjoint.subset_compl_right⟩ := subset_compl_iff_disjoint_right #align disjoint.subset_compl_right Disjoint.subset_compl_right alias ⟨_, _root_.Disjoint.subset_compl_left⟩ := subset_compl_iff_disjoint_left #align disjoint.subset_compl_left Disjoint.subset_compl_left alias ⟨_, _root_.HasSubset.Subset.disjoint_compl_left⟩ := disjoint_compl_left_iff_subset #align has_subset.subset.disjoint_compl_left HasSubset.Subset.disjoint_compl_left alias ⟨_, _root_.HasSubset.Subset.disjoint_compl_right⟩ := disjoint_compl_right_iff_subset #align has_subset.subset.disjoint_compl_right HasSubset.Subset.disjoint_compl_right theorem subset_union_compl_iff_inter_subset {s t u : Set α} : s ⊆ t ∪ uᶜ ↔ s ∩ u ⊆ t := (@isCompl_compl _ u _).le_sup_right_iff_inf_left_le #align set.subset_union_compl_iff_inter_subset Set.subset_union_compl_iff_inter_subset theorem compl_subset_iff_union {s t : Set α} : sᶜ ⊆ t ↔ s ∪ t = univ := Iff.symm <\| eq_univ_iff_forall.trans <\| forall_congr' fun _ => or_iff_not_imp_left #align set.compl_subset_iff_union Set.compl_subset_iff_union @[simp] theorem subset_compl_singleton_iff {a : α} {s : Set α} : s ⊆ {a}ᶜ ↔ a ∉ s := subset_compl_comm.trans singleton_subset_iff #align set.subset_compl_singleton_iff Set.subset_compl_singleton_iff theorem inter_subset (a b c : Set α) : a ∩ b ⊆ c ↔ a ⊆ bᶜ ∪ c := forall_congr' fun _ => and_imp.trans <\| imp_congr_right fun _ => imp_iff_not_or #align set.inter_subset Set.inter_subset theorem inter_compl_nonempty_iff {s t : Set α} : (s ∩ tᶜ).Nonempty ↔ ¬s ⊆ t := (not_subset.trans <\| exists_congr fun x => by simp [mem_compl]).symm #align set.inter_compl_nonempty_iff Set.inter_compl_nonempty_iff theorem not_mem_diff_of_mem {s t : Set α} {x : α} (hx : x ∈ t) : x ∉ s \ t := fun h => h.2 hx #align set.not_mem_diff_of_mem Set.not_mem_diff_of_mem theorem mem_of_mem_diff {s t : Set α} {x : α} (h : x ∈ s \ t) : x ∈ s := h.left #align set.mem_of_mem_diff Set.mem_of_mem_diff theorem not_mem_of_mem_diff {s t : Set α} {x : α} (h : x ∈ s \ t) : x ∉ t := h.right #align set.not_mem_of_mem_diff Set.not_mem_of_mem_diff theorem diff_eq_compl_inter {s t : Set α} : s \ t = tᶜ ∩ s := by rw [diff_eq, inter_comm] #align set.diff_eq_compl_inter Set.diff_eq_compl_inter theorem nonempty_diff {s t : Set α} : (s \ t).Nonempty ↔ ¬s ⊆ t := inter_compl_nonempty_iff #align set.nonempty_diff Set.nonempty_diff theorem diff_subset {s t : Set α} : s \ t ⊆ s := show s \ t ≤ s from sdiff_le #align set.diff_subset Set.diff_subset theorem diff_subset_compl (s t : Set α) : s \ t ⊆ tᶜ := diff_eq_compl_inter ▸ inter_subset_left theorem union_diff_cancel' {s t u : Set α} (h₁ : s ⊆ t) (h₂ : t ⊆ u) : t ∪ u \ s = u := sup_sdiff_cancel' h₁ h₂ #align set.union_diff_cancel' Set.union_diff_cancel' theorem union_diff_cancel {s t : Set α} (h : s ⊆ t) : s ∪ t \ s = t := sup_sdiff_cancel_right h #align set.union_diff_cancel Set.union_diff_cancel theorem union_diff_cancel_left {s t : Set α} (h : s ∩ t ⊆ ∅) : (s ∪ t) \ s = t := Disjoint.sup_sdiff_cancel_left <\| disjoint_iff_inf_le.2 h #align set.union_diff_cancel_left Set.union_diff_cancel_left theorem union_diff_cancel_right {s t : Set α} (h : s ∩ t ⊆ ∅) : (s ∪ t) \ t = s := Disjoint.sup_sdiff_cancel_right <\| disjoint_iff_inf_le.2 h #align set.union_diff_cancel_right Set.union_diff_cancel_right @[simp] theorem union_diff_left {s t : Set α} : (s ∪ t) \ s = t \ s := sup_sdiff_left_self #align set.union_diff_left Set.union_diff_left @[simp] theorem union_diff_right {s t : Set α} : (s ∪ t) \ t = s \ t := sup_sdiff_right_self #align set.union_diff_right Set.union_diff_right theorem union_diff_distrib {s t u : Set α} : (s ∪ t) \ u = s \ u ∪ t \ u := sup_sdiff #align set.union_diff_distrib Set.union_diff_distrib theorem inter_diff_assoc (a b c : Set α) : (a ∩ b) \ c = a ∩ (b \ c) := inf_sdiff_assoc #align set.inter_diff_assoc Set.inter_diff_assoc @[simp] theorem inter_diff_self (a b : Set α) : a ∩ (b \ a) = ∅ := inf_sdiff_self_right #align set.inter_diff_self Set.inter_diff_self @[simp] theorem inter_union_diff (s t : Set α) : s ∩ t ∪ s \ t = s := sup_inf_sdiff s t #align set.inter_union_diff Set.inter_union_diff @[simp] theorem diff_union_inter (s t : Set α) : s \ t ∪ s ∩ t = s := by rw [union_comm] exact sup_inf_sdiff _ _ #align set.diff_union_inter Set.diff_union_inter @[simp] theorem inter_union_compl (s t : Set α) : s ∩ t ∪ s ∩ tᶜ = s := inter_union_diff _ _ #align set.inter_union_compl Set.inter_union_compl @[gcongr] theorem diff_subset_diff {s₁ s₂ t₁ t₂ : Set α} : s₁ ⊆ s₂ → t₂ ⊆ t₁ → s₁ \ t₁ ⊆ s₂ \ t₂ := show s₁ ≤ s₂ → t₂ ≤ t₁ → s₁ \ t₁ ≤ s₂ \ t₂ from sdiff_le_sdiff #align set.diff_subset_diff Set.diff_subset_diff @[gcongr] theorem diff_subset_diff_left {s₁ s₂ t : Set α} (h : s₁ ⊆ s₂) : s₁ \ t ⊆ s₂ \ t := sdiff_le_sdiff_right ‹s₁ ≤ s₂› #align set.diff_subset_diff_left Set.diff_subset_diff_left @[gcongr] theorem diff_subset_diff_right {s t u : Set α} (h : t ⊆ u) : s \ u ⊆ s \ t := sdiff_le_sdiff_left ‹t ≤ u› #align set.diff_subset_diff_right Set.diff_subset_diff_right theorem compl_eq_univ_diff (s : Set α) : sᶜ = univ \ s := top_sdiff.symm #align set.compl_eq_univ_diff Set.compl_eq_univ_diff @[simp] theorem empty_diff (s : Set α) : (∅ \ s : Set α) = ∅ := bot_sdiff #align set.empty_diff Set.empty_diff theorem diff_eq_empty {s t : Set α} : s \ t = ∅ ↔ s ⊆ t := sdiff_eq_bot_iff #align set.diff_eq_empty Set.diff_eq_empty @[simp] theorem diff_empty {s : Set α} : s \ ∅ = s := sdiff_bot #align set.diff_empty Set.diff_empty @[simp] theorem diff_univ (s : Set α) : s \ univ = ∅ := diff_eq_empty.2 (subset_univ s) #align set.diff_univ Set.diff_univ theorem diff_diff {u : Set α} : (s \ t) \ u = s \ (t ∪ u) := sdiff_sdiff_left #align set.diff_diff Set.diff_diff -- the following statement contains parentheses to help the reader theorem diff_diff_comm {s t u : Set α} : (s \ t) \ u = (s \ u) \ t := sdiff_sdiff_comm #align set.diff_diff_comm Set.diff_diff_comm theorem diff_subset_iff {s t u : Set α} : s \ t ⊆ u ↔ s ⊆ t ∪ u := show s \ t ≤ u ↔ s ≤ t ∪ u from sdiff_le_iff #align set.diff_subset_iff Set.diff_subset_iff theorem subset_diff_union (s t : Set α) : s ⊆ s \ t ∪ t := show s ≤ s \ t ∪ t from le_sdiff_sup #align set.subset_diff_union Set.subset_diff_union theorem diff_union_of_subset {s t : Set α} (h : t ⊆ s) : s \ t ∪ t = s := Subset.antisymm (union_subset diff_subset h) (subset_diff_union _ _) #align set.diff_union_of_subset Set.diff_union_of_subset @[simp] theorem diff_singleton_subset_iff {x : α} {s t : Set α} : s \ {x} ⊆ t ↔ s ⊆ insert x t := by rw [← union_singleton, union_comm] apply diff_subset_iff #align set.diff_singleton_subset_iff Set.diff_singleton_subset_iff theorem subset_diff_singleton {x : α} {s t : Set α} (h : s ⊆ t) (hx : x ∉ s) : s ⊆ t \ {x} := subset_inter h <\| subset_compl_comm.1 <\| singleton_subset_iff.2 hx #align set.subset_diff_singleton Set.subset_diff_singleton theorem subset_insert_diff_singleton (x : α) (s : Set α) : s ⊆ insert x (s \ {x}) := by rw [← diff_singleton_subset_iff] #align set.subset_insert_diff_singleton Set.subset_insert_diff_singleton theorem diff_subset_comm {s t u : Set α} : s \ t ⊆ u ↔ s \ u ⊆ t := show s \ t ≤ u ↔ s \ u ≤ t from sdiff_le_comm #align set.diff_subset_comm Set.diff_subset_comm theorem diff_inter {s t u : Set α} : s \ (t ∩ u) = s \ t ∪ s \ u := sdiff_inf #align set.diff_inter Set.diff_inter theorem diff_inter_diff {s t u : Set α} : s \ t ∩ (s \ u) = s \ (t ∪ u) := sdiff_sup.symm #align set.diff_inter_diff Set.diff_inter_diff theorem diff_compl : s \ tᶜ = s ∩ t := sdiff_compl #align set.diff_compl Set.diff_compl theorem diff_diff_right {s t u : Set α} : s \ (t \ u) = s \ t ∪ s ∩ u := sdiff_sdiff_right' #align set.diff_diff_right Set.diff_diff_right @[simp] theorem insert_diff_of_mem (s) (h : a ∈ t) : insert a s \ t = s \ t := by ext constructor <;> simp (config := { contextual := true }) [or_imp, h] #align set.insert_diff_of_mem Set.insert_diff_of_mem theorem insert_diff_of_not_mem (s) (h : a ∉ t) : insert a s \ t = insert a (s \ t) := by classical ext x by_cases h' : x ∈ t · have : x ≠ a := by intro H rw [H] at h' exact h h' simp [h, h', this] · simp [h, h'] #align set.insert_diff_of_not_mem Set.insert_diff_of_not_mem theorem insert_diff_self_of_not_mem {a : α} {s : Set α} (h : a ∉ s) : insert a s \ {a} = s := by ext x simp [and_iff_left_of_imp fun hx : x ∈ s => show x ≠ a from fun hxa => h <\| hxa ▸ hx] #align set.insert_diff_self_of_not_mem Set.insert_diff_self_of_not_mem @[simp] theorem insert_diff_eq_singleton {a : α} {s : Set α} (h : a ∉ s) : insert a s \ s = {a} := by ext rw [Set.mem_diff, Set.mem_insert_iff, Set.mem_singleton_iff, or_and_right, and_not_self_iff, or_false_iff, and_iff_left_iff_imp] rintro rfl exact h #align set.insert_diff_eq_singleton Set.insert_diff_eq_singleton theorem inter_insert_of_mem (h : a ∈ s) : s ∩ insert a t = insert a (s ∩ t) := by rw [insert_inter_distrib, insert_eq_of_mem h] #align set.inter_insert_of_mem Set.inter_insert_of_mem theorem insert_inter_of_mem (h : a ∈ t) : insert a s ∩ t = insert a (s ∩ t) := by rw [insert_inter_distrib, insert_eq_of_mem h] #align set.insert_inter_of_mem Set.insert_inter_of_mem theorem inter_insert_of_not_mem (h : a ∉ s) : s ∩ insert a t = s ∩ t := ext fun _ => and_congr_right fun hx => or_iff_right <\| ne_of_mem_of_not_mem hx h #align set.inter_insert_of_not_mem Set.inter_insert_of_not_mem theorem insert_inter_of_not_mem (h : a ∉ t) : insert a s ∩ t = s ∩ t := ext fun _ => and_congr_left fun hx => or_iff_right <\| ne_of_mem_of_not_mem hx h #align set.insert_inter_of_not_mem Set.insert_inter_of_not_mem @[simp] theorem union_diff_self {s t : Set α} : s ∪ t \ s = s ∪ t := sup_sdiff_self _ _ #align set.union_diff_self Set.union_diff_self @[simp] theorem diff_union_self {s t : Set α} : s \ t ∪ t = s ∪ t := sdiff_sup_self _ _ #align set.diff_union_self Set.diff_union_self @[simp] theorem diff_inter_self {a b : Set α} : b \ a ∩ a = ∅ := inf_sdiff_self_left #align set.diff_inter_self Set.diff_inter_self @[simp] theorem diff_inter_self_eq_diff {s t : Set α} : s \ (t ∩ s) = s \ t := sdiff_inf_self_right _ _ #align set.diff_inter_self_eq_diff Set.diff_inter_self_eq_diff @[simp] theorem diff_self_inter {s t : Set α} : s \ (s ∩ t) = s \ t := sdiff_inf_self_left _ _ #align set.diff_self_inter Set.diff_self_inter @[simp] theorem diff_singleton_eq_self {a : α} {s : Set α} (h : a ∉ s) : s \ {a} = s := sdiff_eq_self_iff_disjoint.2 <\| by simp [h] #align set.diff_singleton_eq_self Set.diff_singleton_eq_self @[simp] theorem diff_singleton_sSubset {s : Set α} {a : α} : s \ {a} ⊂ s ↔ a ∈ s := sdiff_le.lt_iff_ne.trans <\| sdiff_eq_left.not.trans <\| by simp #align set.diff_singleton_ssubset Set.diff_singleton_sSubset @[simp] theorem insert_diff_singleton {a : α} {s : Set α} : insert a (s \ {a}) = insert a s := by simp [insert_eq, union_diff_self, -union_singleton, -singleton_union] #align set.insert_diff_singleton Set.insert_diff_singleton theorem insert_diff_singleton_comm (hab : a ≠ b) (s : Set α) : insert a (s \ {b}) = insert a s \ {b} := by simp_rw [← union_singleton, union_diff_distrib, diff_singleton_eq_self (mem_singleton_iff.not.2 hab.symm)] #align set.insert_diff_singleton_comm Set.insert_diff_singleton_comm --Porting note (#10618): removed `simp` attribute because `simp` can prove it theorem diff_self {s : Set α} : s \ s = ∅ := sdiff_self #align set.diff_self Set.diff_self theorem diff_diff_right_self (s t : Set α) : s \ (s \ t) = s ∩ t := sdiff_sdiff_right_self #align set.diff_diff_right_self Set.diff_diff_right_self theorem diff_diff_cancel_left {s t : Set α} (h : s ⊆ t) : t \ (t \ s) = s := sdiff_sdiff_eq_self h #align set.diff_diff_cancel_left Set.diff_diff_cancel_left theorem mem_diff_singleton {x y : α} {s : Set α} : x ∈ s \ {y} ↔ x ∈ s ∧ x ≠ y := Iff.rfl #align set.mem_diff_singleton Set.mem_diff_singleton theorem mem_diff_singleton_empty {t : Set (Set α)} : s ∈ t \ {∅} ↔ s ∈ t ∧ s.Nonempty := mem_diff_singleton.trans <\| and_congr_right' nonempty_iff_ne_empty.symm #align set.mem_diff_singleton_empty Set.mem_diff_singleton_empty theorem subset_insert_iff {s t : Set α} {x : α} : s ⊆ insert x t ↔ s ⊆ t ∨ (x ∈ s ∧ s \ {x} ⊆ t) := by rw [← diff_singleton_subset_iff] by_cases hx : x ∈ s · rw [and_iff_right hx, or_iff_right_of_imp diff_subset.trans] rw [diff_singleton_eq_self hx, or_iff_left_of_imp And.right] theorem union_eq_diff_union_diff_union_inter (s t : Set α) : s ∪ t = s \ t ∪ t \ s ∪ s ∩ t := sup_eq_sdiff_sup_sdiff_sup_inf #align set.union_eq_diff_union_diff_union_inter Set.union_eq_diff_union_diff_union_inter --Porting note (#10618): removed `simp` attribute because `simp` can prove it theorem pair_eq_singleton (a : α) : ({a, a} : Set α) = {a} := union_self _ #align set.pair_eq_singleton Set.pair_eq_singleton theorem pair_comm (a b : α) : ({a, b} : Set α) = {b, a} := union_comm _ _ #align set.pair_comm Set.pair_comm theorem pair_eq_pair_iff {x y z w : α} : ({x, y} : Set α) = {z, w} ↔ x = z ∧ y = w ∨ x = w ∧ y = z := by simp [subset_antisymm_iff, insert_subset_iff]; aesop #align set.pair_eq_pair_iff Set.pair_eq_pair_iff theorem pair_diff_left (hne : a ≠ b) : ({a, b} : Set α) \ {a} = {b} := by rw [insert_diff_of_mem _ (mem_singleton a), diff_singleton_eq_self (by simpa)] theorem pair_diff_right (hne : a ≠ b) : ({a, b} : Set α) \ {b} = {a} := by rw [pair_comm, pair_diff_left hne.symm] theorem pair_subset_iff : {a, b} ⊆ s ↔ a ∈ s ∧ b ∈ s := by rw [insert_subset_iff, singleton_subset_iff] theorem pair_subset (ha : a ∈ s) (hb : b ∈ s) : {a, b} ⊆ s := pair_subset_iff.2 ⟨ha,hb⟩ theorem subset_pair_iff : s ⊆ {a, b} ↔ ∀ x ∈ s, x = a ∨ x = b := by simp [subset_def] theorem subset_pair_iff_eq {x y : α} : s ⊆ {x, y} ↔ s = ∅ ∨ s = {x} ∨ s = {y} ∨ s = {x, y} := by refine ⟨?_, by rintro (rfl \| rfl \| rfl \| rfl) <;> simp [pair_subset_iff]⟩ rw [subset_insert_iff, subset_singleton_iff_eq, subset_singleton_iff_eq, ← subset_empty_iff (s := s \ {x}), diff_subset_iff, union_empty, subset_singleton_iff_eq] have h : x ∈ s → {y} = s \ {x} → s = {x,y} := fun h₁ h₂ ↦ by simp [h₁, h₂] tauto theorem Nonempty.subset_pair_iff_eq (hs : s.Nonempty) : s ⊆ {a, b} ↔ s = {a} ∨ s = {b} ∨ s = {a, b} := by rw [Set.subset_pair_iff_eq, or_iff_right]; exact hs.ne_empty section open scoped symmDiff theorem mem_symmDiff : a ∈ s ∆ t ↔ a ∈ s ∧ a ∉ t ∨ a ∈ t ∧ a ∉ s := Iff.rfl #align set.mem_symm_diff Set.mem_symmDiff protected theorem symmDiff_def (s t : Set α) : s ∆ t = s \ t ∪ t \ s := rfl #align set.symm_diff_def Set.symmDiff_def theorem symmDiff_subset_union : s ∆ t ⊆ s ∪ t := @symmDiff_le_sup (Set α) _ _ _ #align set.symm_diff_subset_union Set.symmDiff_subset_union @[simp] theorem symmDiff_eq_empty : s ∆ t = ∅ ↔ s = t := symmDiff_eq_bot #align set.symm_diff_eq_empty Set.symmDiff_eq_empty @[simp] theorem symmDiff_nonempty : (s ∆ t).Nonempty ↔ s ≠ t := nonempty_iff_ne_empty.trans symmDiff_eq_empty.not #align set.symm_diff_nonempty Set.symmDiff_nonempty theorem inter_symmDiff_distrib_left (s t u : Set α) : s ∩ t ∆ u = (s ∩ t) ∆ (s ∩ u) := inf_symmDiff_distrib_left _ _ _ #align set.inter_symm_diff_distrib_left Set.inter_symmDiff_distrib_left theorem inter_symmDiff_distrib_right (s t u : Set α) : s ∆ t ∩ u = (s ∩ u) ∆ (t ∩ u) := inf_symmDiff_distrib_right _ _ _ #align set.inter_symm_diff_distrib_right Set.inter_symmDiff_distrib_right theorem subset_symmDiff_union_symmDiff_left (h : Disjoint s t) : u ⊆ s ∆ u ∪ t ∆ u := h.le_symmDiff_sup_symmDiff_left #align set.subset_symm_diff_union_symm_diff_left Set.subset_symmDiff_union_symmDiff_left theorem subset_symmDiff_union_symmDiff_right (h : Disjoint t u) : s ⊆ s ∆ t ∪ s ∆ u := h.le_symmDiff_sup_symmDiff_right #align set.subset_symm_diff_union_symm_diff_right Set.subset_symmDiff_union_symmDiff_right end #align set.powerset Set.powerset theorem mem_powerset {x s : Set α} (h : x ⊆ s) : x ∈ 𝒫 s := @h #align set.mem_powerset Set.mem_powerset theorem subset_of_mem_powerset {x s : Set α} (h : x ∈ 𝒫 s) : x ⊆ s := @h #align set.subset_of_mem_powerset Set.subset_of_mem_powerset @[simp] theorem mem_powerset_iff (x s : Set α) : x ∈ 𝒫 s ↔ x ⊆ s := Iff.rfl #align set.mem_powerset_iff Set.mem_powerset_iff theorem powerset_inter (s t : Set α) : 𝒫(s ∩ t) = 𝒫 s ∩ 𝒫 t := ext fun _ => subset_inter_iff #align set.powerset_inter Set.powerset_inter @[simp] theorem powerset_mono : 𝒫 s ⊆ 𝒫 t ↔ s ⊆ t := ⟨fun h => @h _ (fun _ h => h), fun h _ hu _ ha => h (hu ha)⟩ #align set.powerset_mono Set.powerset_mono theorem monotone_powerset : Monotone (powerset : Set α → Set (Set α)) := fun _ _ => powerset_mono.2 #align set.monotone_powerset Set.monotone_powerset @[simp] theorem powerset_nonempty : (𝒫 s).Nonempty := ⟨∅, fun _ h => empty_subset s h⟩ #align set.powerset_nonempty Set.powerset_nonempty @[simp] theorem powerset_empty : 𝒫(∅ : Set α) = {∅} := ext fun _ => subset_empty_iff #align set.powerset_empty Set.powerset_empty @[simp] theorem powerset_univ : 𝒫(univ : Set α) = univ := eq_univ_of_forall subset_univ #align set.powerset_univ Set.powerset_univ theorem powerset_singleton (x : α) : 𝒫({x} : Set α) = {∅, {x}} := by ext y rw [mem_powerset_iff, subset_singleton_iff_eq, mem_insert_iff, mem_singleton_iff] #align set.powerset_singleton Set.powerset_singleton theorem mem_dite (p : Prop) [Decidable p] (s : p → Set α) (t : ¬ p → Set α) (x : α) : (x ∈ if h : p then s h else t h) ↔ (∀ h : p, x ∈ s h) ∧ ∀ h : ¬p, x ∈ t h := by split_ifs with hp · exact ⟨fun hx => ⟨fun _ => hx, fun hnp => (hnp hp).elim⟩, fun hx => hx.1 hp⟩ · exact ⟨fun hx => ⟨fun h => (hp h).elim, fun _ => hx⟩, fun hx => hx.2 hp⟩ theorem mem_dite_univ_right (p : Prop) [Decidable p] (t : p → Set α) (x : α) : (x ∈ if h : p then t h else univ) ↔ ∀ h : p, x ∈ t h := by split_ifs <;> simp_all #align set.mem_dite_univ_right Set.mem_dite_univ_right @[simp] theorem mem_ite_univ_right (p : Prop) [Decidable p] (t : Set α) (x : α) : x ∈ ite p t Set.univ ↔ p → x ∈ t := mem_dite_univ_right p (fun _ => t) x #align set.mem_ite_univ_right Set.mem_ite_univ_right theorem mem_dite_univ_left (p : Prop) [Decidable p] (t : ¬p → Set α) (x : α) : (x ∈ if h : p then univ else t h) ↔ ∀ h : ¬p, x ∈ t h := by split_ifs <;> simp_all #align set.mem_dite_univ_left Set.mem_dite_univ_left @[simp] theorem mem_ite_univ_left (p : Prop) [Decidable p] (t : Set α) (x : α) : x ∈ ite p Set.univ t ↔ ¬p → x ∈ t := mem_dite_univ_left p (fun _ => t) x #align set.mem_ite_univ_left Set.mem_ite_univ_left theorem mem_dite_empty_right (p : Prop) [Decidable p] (t : p → Set α) (x : α) : (x ∈ if h : p then t h else ∅) ↔ ∃ h : p, x ∈ t h := by simp only [mem_dite, mem_empty_iff_false, imp_false, not_not] exact ⟨fun h => ⟨h.2, h.1 h.2⟩, fun ⟨h₁, h₂⟩ => ⟨fun _ => h₂, h₁⟩⟩ #align set.mem_dite_empty_right Set.mem_dite_empty_right @[simp] theorem mem_ite_empty_right (p : Prop) [Decidable p] (t : Set α) (x : α) : x ∈ ite p t ∅ ↔ p ∧ x ∈ t := (mem_dite_empty_right p (fun _ => t) x).trans (by simp) #align set.mem_ite_empty_right Set.mem_ite_empty_right theorem mem_dite_empty_left (p : Prop) [Decidable p] (t : ¬p → Set α) (x : α) : (x ∈ if h : p then ∅ else t h) ↔ ∃ h : ¬p, x ∈ t h := by simp only [mem_dite, mem_empty_iff_false, imp_false] exact ⟨fun h => ⟨h.1, h.2 h.1⟩, fun ⟨h₁, h₂⟩ => ⟨fun h => h₁ h, fun _ => h₂⟩⟩ #align set.mem_dite_empty_left Set.mem_dite_empty_left @[simp] theorem mem_ite_empty_left (p : Prop) [Decidable p] (t : Set α) (x : α) : x ∈ ite p ∅ t ↔ ¬p ∧ x ∈ t := (mem_dite_empty_left p (fun _ => t) x).trans (by simp) #align set.mem_ite_empty_left Set.mem_ite_empty_left protected def ite (t s s' : Set α) : Set α := s ∩ t ∪ s' \ t #align set.ite Set.ite @[simp] theorem ite_inter_self (t s s' : Set α) : t.ite s s' ∩ t = s ∩ t := by rw [Set.ite, union_inter_distrib_right, diff_inter_self, inter_assoc, inter_self, union_empty] #align set.ite_inter_self Set.ite_inter_self @[simp] theorem ite_compl (t s s' : Set α) : tᶜ.ite s s' = t.ite s' s := by rw [Set.ite, Set.ite, diff_compl, union_comm, diff_eq] #align set.ite_compl Set.ite_compl @[simp] theorem ite_inter_compl_self (t s s' : Set α) : t.ite s s' ∩ tᶜ = s' ∩ tᶜ := by rw [← ite_compl, ite_inter_self] #align set.ite_inter_compl_self Set.ite_inter_compl_self @[simp] theorem ite_diff_self (t s s' : Set α) : t.ite s s' \ t = s' \ t := ite_inter_compl_self t s s' #align set.ite_diff_self Set.ite_diff_self @[simp] theorem ite_same (t s : Set α) : t.ite s s = s := inter_union_diff _ _ #align set.ite_same Set.ite_same @[simp] theorem ite_left (s t : Set α) : s.ite s t = s ∪ t := by simp [Set.ite] #align set.ite_left Set.ite_left @[simp]	Mathlib/Data/Set/Basic.lean	2,295	2,295	theorem ite_right (s t : Set α) : s.ite t s = t ∩ s := by	simp [Set.ite]
import Mathlib.Data.Opposite import Mathlib.Data.Set.Defs #align_import data.set.opposite from "leanprover-community/mathlib"@"fc2ed6f838ce7c9b7c7171e58d78eaf7b438fb0e" variable {α : Type*} open Opposite namespace Set protected def op (s : Set α) : Set αᵒᵖ := unop ⁻¹' s #align set.op Set.op protected def unop (s : Set αᵒᵖ) : Set α := op ⁻¹' s #align set.unop Set.unop @[simp] theorem mem_op {s : Set α} {a : αᵒᵖ} : a ∈ s.op ↔ unop a ∈ s := Iff.rfl #align set.mem_op Set.mem_op @[simp 1100] theorem op_mem_op {s : Set α} {a : α} : op a ∈ s.op ↔ a ∈ s := by rfl #align set.op_mem_op Set.op_mem_op @[simp] theorem mem_unop {s : Set αᵒᵖ} {a : α} : a ∈ s.unop ↔ op a ∈ s := Iff.rfl #align set.mem_unop Set.mem_unop @[simp 1100] theorem unop_mem_unop {s : Set αᵒᵖ} {a : αᵒᵖ} : unop a ∈ s.unop ↔ a ∈ s := by rfl #align set.unop_mem_unop Set.unop_mem_unop @[simp] theorem op_unop (s : Set α) : s.op.unop = s := rfl #align set.op_unop Set.op_unop @[simp] theorem unop_op (s : Set αᵒᵖ) : s.unop.op = s := rfl #align set.unop_op Set.unop_op @[simps] def opEquiv_self (s : Set α) : s.op ≃ s := ⟨fun x ↦ ⟨unop x, x.2⟩, fun x ↦ ⟨op x, x.2⟩, fun _ ↦ rfl, fun _ ↦ rfl⟩ #align set.op_equiv_self Set.opEquiv_self #align set.op_equiv_self_apply_coe Set.opEquiv_self_apply_coe #align set.op_equiv_self_symm_apply_coe Set.opEquiv_self_symm_apply_coe @[simps] def opEquiv : Set α ≃ Set αᵒᵖ := ⟨Set.op, Set.unop, op_unop, unop_op⟩ #align set.op_equiv Set.opEquiv #align set.op_equiv_symm_apply Set.opEquiv_symm_apply #align set.op_equiv_apply Set.opEquiv_apply @[simp] theorem singleton_op (x : α) : ({x} : Set α).op = {op x} := by ext constructor · apply unop_injective · apply op_injective #align set.singleton_op Set.singleton_op @[simp] theorem singleton_unop (x : αᵒᵖ) : ({x} : Set αᵒᵖ).unop = {unop x} := by ext constructor · apply op_injective · apply unop_injective #align set.singleton_unop Set.singleton_unop @[simp 1100]	Mathlib/Data/Set/Opposite.lean	92	96	theorem singleton_op_unop (x : α) : ({op x} : Set αᵒᵖ).unop = {x} := by	ext constructor · apply op_injective · apply unop_injective
import Mathlib.Probability.ProbabilityMassFunction.Monad #align_import probability.probability_mass_function.constructions from "leanprover-community/mathlib"@"4ac69b290818724c159de091daa3acd31da0ee6d" universe u namespace PMF noncomputable section variable {α β γ : Type*} open scoped Classical open NNReal ENNReal section Map def map (f : α → β) (p : PMF α) : PMF β := bind p (pure ∘ f) #align pmf.map PMF.map variable (f : α → β) (p : PMF α) (b : β) theorem monad_map_eq_map {α β : Type u} (f : α → β) (p : PMF α) : f <$> p = p.map f := rfl #align pmf.monad_map_eq_map PMF.monad_map_eq_map @[simp] theorem map_apply : (map f p) b = ∑' a, if b = f a then p a else 0 := by simp [map] #align pmf.map_apply PMF.map_apply @[simp] theorem support_map : (map f p).support = f '' p.support := Set.ext fun b => by simp [map, @eq_comm β b] #align pmf.support_map PMF.support_map theorem mem_support_map_iff : b ∈ (map f p).support ↔ ∃ a ∈ p.support, f a = b := by simp #align pmf.mem_support_map_iff PMF.mem_support_map_iff theorem bind_pure_comp : bind p (pure ∘ f) = map f p := rfl #align pmf.bind_pure_comp PMF.bind_pure_comp theorem map_id : map id p = p := bind_pure _ #align pmf.map_id PMF.map_id	Mathlib/Probability/ProbabilityMassFunction/Constructions.lean	70	70	theorem map_comp (g : β → γ) : (p.map f).map g = p.map (g ∘ f) := by	simp [map, Function.comp]
import Mathlib.Algebra.Polynomial.AlgebraMap import Mathlib.Algebra.Polynomial.Reverse import Mathlib.Algebra.Polynomial.Inductions import Mathlib.RingTheory.Localization.Basic #align_import data.polynomial.laurent from "leanprover-community/mathlib"@"831c494092374cfe9f50591ed0ac81a25efc5b86" open Polynomial Function AddMonoidAlgebra Finsupp noncomputable section variable {R : Type} abbrev LaurentPolynomial (R : Type) [Semiring R] := AddMonoidAlgebra R ℤ #align laurent_polynomial LaurentPolynomial @[nolint docBlame] scoped[LaurentPolynomial] notation:9000 R "[T;T⁻¹]" => LaurentPolynomial R open LaurentPolynomial -- Porting note: `ext` no longer applies `Finsupp.ext` automatically @[ext] theorem LaurentPolynomial.ext [Semiring R] {p q : R[T;T⁻¹]} (h : ∀ a, p a = q a) : p = q := Finsupp.ext h def Polynomial.toLaurent [Semiring R] : R[X] →+* R[T;T⁻¹] := (mapDomainRingHom R Int.ofNatHom).comp (toFinsuppIso R) #align polynomial.to_laurent Polynomial.toLaurent theorem Polynomial.toLaurent_apply [Semiring R] (p : R[X]) : toLaurent p = p.toFinsupp.mapDomain (↑) := rfl #align polynomial.to_laurent_apply Polynomial.toLaurent_apply def Polynomial.toLaurentAlg [CommSemiring R] : R[X] →ₐ[R] R[T;T⁻¹] := (mapDomainAlgHom R R Int.ofNatHom).comp (toFinsuppIsoAlg R).toAlgHom #align polynomial.to_laurent_alg Polynomial.toLaurentAlg @[simp] lemma Polynomial.coe_toLaurentAlg [CommSemiring R] : (toLaurentAlg : R[X] → R[T;T⁻¹]) = toLaurent := rfl theorem Polynomial.toLaurentAlg_apply [CommSemiring R] (f : R[X]) : toLaurentAlg f = toLaurent f := rfl #align polynomial.to_laurent_alg_apply Polynomial.toLaurentAlg_apply namespace LaurentPolynomial section Semiring variable [Semiring R] theorem single_zero_one_eq_one : (Finsupp.single 0 1 : R[T;T⁻¹]) = (1 : R[T;T⁻¹]) := rfl #align laurent_polynomial.single_zero_one_eq_one LaurentPolynomial.single_zero_one_eq_one def C : R →+* R[T;T⁻¹] := singleZeroRingHom set_option linter.uppercaseLean3 false in #align laurent_polynomial.C LaurentPolynomial.C theorem algebraMap_apply {R A : Type} [CommSemiring R] [Semiring A] [Algebra R A] (r : R) : algebraMap R (LaurentPolynomial A) r = C (algebraMap R A r) := rfl #align laurent_polynomial.algebra_map_apply LaurentPolynomial.algebraMap_apply theorem C_eq_algebraMap {R : Type} [CommSemiring R] (r : R) : C r = algebraMap R R[T;T⁻¹] r := rfl set_option linter.uppercaseLean3 false in #align laurent_polynomial.C_eq_algebra_map LaurentPolynomial.C_eq_algebraMap theorem single_eq_C (r : R) : Finsupp.single 0 r = C r := rfl set_option linter.uppercaseLean3 false in #align laurent_polynomial.single_eq_C LaurentPolynomial.single_eq_C @[simp] lemma C_apply (t : R) (n : ℤ) : C t n = if n = 0 then t else 0 := by rw [← single_eq_C, Finsupp.single_apply]; aesop def T (n : ℤ) : R[T;T⁻¹] := Finsupp.single n 1 set_option linter.uppercaseLean3 false in #align laurent_polynomial.T LaurentPolynomial.T @[simp] lemma T_apply (m n : ℤ) : (T n : R[T;T⁻¹]) m = if n = m then 1 else 0 := Finsupp.single_apply @[simp] theorem T_zero : (T 0 : R[T;T⁻¹]) = 1 := rfl set_option linter.uppercaseLean3 false in #align laurent_polynomial.T_zero LaurentPolynomial.T_zero theorem T_add (m n : ℤ) : (T (m + n) : R[T;T⁻¹]) = T m * T n := by -- Porting note: was `convert single_mul_single.symm` simp [T, single_mul_single] set_option linter.uppercaseLean3 false in #align laurent_polynomial.T_add LaurentPolynomial.T_add theorem T_sub (m n : ℤ) : (T (m - n) : R[T;T⁻¹]) = T m * T (-n) := by rw [← T_add, sub_eq_add_neg] set_option linter.uppercaseLean3 false in #align laurent_polynomial.T_sub LaurentPolynomial.T_sub @[simp] theorem T_pow (m : ℤ) (n : ℕ) : (T m ^ n : R[T;T⁻¹]) = T (n * m) := by rw [T, T, single_pow n, one_pow, nsmul_eq_mul] set_option linter.uppercaseLean3 false in #align laurent_polynomial.T_pow LaurentPolynomial.T_pow @[simp] theorem mul_T_assoc (f : R[T;T⁻¹]) (m n : ℤ) : f * T m * T n = f * T (m + n) := by simp [← T_add, mul_assoc] set_option linter.uppercaseLean3 false in #align laurent_polynomial.mul_T_assoc LaurentPolynomial.mul_T_assoc @[simp] theorem single_eq_C_mul_T (r : R) (n : ℤ) : (Finsupp.single n r : R[T;T⁻¹]) = (C r * T n : R[T;T⁻¹]) := by -- Porting note: was `convert single_mul_single.symm` simp [C, T, single_mul_single] set_option linter.uppercaseLean3 false in #align laurent_polynomial.single_eq_C_mul_T LaurentPolynomial.single_eq_C_mul_T -- This lemma locks in the right changes and is what Lean proved directly. -- The actual `simp`-normal form of a Laurent monomial is `C a * T n`, whenever it can be reached. @[simp] theorem _root_.Polynomial.toLaurent_C_mul_T (n : ℕ) (r : R) : (toLaurent (Polynomial.monomial n r) : R[T;T⁻¹]) = C r * T n := show Finsupp.mapDomain (↑) (monomial n r).toFinsupp = (C r * T n : R[T;T⁻¹]) by rw [toFinsupp_monomial, Finsupp.mapDomain_single, single_eq_C_mul_T] set_option linter.uppercaseLean3 false in #align polynomial.to_laurent_C_mul_T Polynomial.toLaurent_C_mul_T @[simp] theorem _root_.Polynomial.toLaurent_C (r : R) : toLaurent (Polynomial.C r) = C r := by convert Polynomial.toLaurent_C_mul_T 0 r simp only [Int.ofNat_zero, T_zero, mul_one] set_option linter.uppercaseLean3 false in #align polynomial.to_laurent_C Polynomial.toLaurent_C @[simp] theorem _root_.Polynomial.toLaurent_comp_C : toLaurent (R := R) ∘ Polynomial.C = C := funext Polynomial.toLaurent_C @[simp] theorem _root_.Polynomial.toLaurent_X : (toLaurent Polynomial.X : R[T;T⁻¹]) = T 1 := by have : (Polynomial.X : R[X]) = monomial 1 1 := by simp [← C_mul_X_pow_eq_monomial] simp [this, Polynomial.toLaurent_C_mul_T] set_option linter.uppercaseLean3 false in #align polynomial.to_laurent_X Polynomial.toLaurent_X -- @[simp] -- Porting note (#10618): simp can prove this theorem _root_.Polynomial.toLaurent_one : (Polynomial.toLaurent : R[X] → R[T;T⁻¹]) 1 = 1 := map_one Polynomial.toLaurent #align polynomial.to_laurent_one Polynomial.toLaurent_one -- @[simp] -- Porting note (#10618): simp can prove this theorem _root_.Polynomial.toLaurent_C_mul_eq (r : R) (f : R[X]) : toLaurent (Polynomial.C r * f) = C r * toLaurent f := by simp only [_root_.map_mul, Polynomial.toLaurent_C] set_option linter.uppercaseLean3 false in #align polynomial.to_laurent_C_mul_eq Polynomial.toLaurent_C_mul_eq -- @[simp] -- Porting note (#10618): simp can prove this theorem _root_.Polynomial.toLaurent_X_pow (n : ℕ) : toLaurent (X ^ n : R[X]) = T n := by simp only [map_pow, Polynomial.toLaurent_X, T_pow, mul_one] set_option linter.uppercaseLean3 false in #align polynomial.to_laurent_X_pow Polynomial.toLaurent_X_pow -- @[simp] -- Porting note (#10618): simp can prove this theorem _root_.Polynomial.toLaurent_C_mul_X_pow (n : ℕ) (r : R) : toLaurent (Polynomial.C r * X ^ n) = C r * T n := by simp only [_root_.map_mul, Polynomial.toLaurent_C, Polynomial.toLaurent_X_pow] set_option linter.uppercaseLean3 false in #align polynomial.to_laurent_C_mul_X_pow Polynomial.toLaurent_C_mul_X_pow instance invertibleT (n : ℤ) : Invertible (T n : R[T;T⁻¹]) where invOf := T (-n) invOf_mul_self := by rw [← T_add, add_left_neg, T_zero] mul_invOf_self := by rw [← T_add, add_right_neg, T_zero] set_option linter.uppercaseLean3 false in #align laurent_polynomial.invertible_T LaurentPolynomial.invertibleT @[simp] theorem invOf_T (n : ℤ) : ⅟ (T n : R[T;T⁻¹]) = T (-n) := rfl set_option linter.uppercaseLean3 false in #align laurent_polynomial.inv_of_T LaurentPolynomial.invOf_T theorem isUnit_T (n : ℤ) : IsUnit (T n : R[T;T⁻¹]) := isUnit_of_invertible _ set_option linter.uppercaseLean3 false in #align laurent_polynomial.is_unit_T LaurentPolynomial.isUnit_T @[elab_as_elim] protected theorem induction_on {M : R[T;T⁻¹] → Prop} (p : R[T;T⁻¹]) (h_C : ∀ a, M (C a)) (h_add : ∀ {p q}, M p → M q → M (p + q)) (h_C_mul_T : ∀ (n : ℕ) (a : R), M (C a * T n) → M (C a * T (n + 1))) (h_C_mul_T_Z : ∀ (n : ℕ) (a : R), M (C a * T (-n)) → M (C a * T (-n - 1))) : M p := by have A : ∀ {n : ℤ} {a : R}, M (C a * T n) := by intro n a refine Int.induction_on n ?_ ?_ ?_ · simpa only [T_zero, mul_one] using h_C a · exact fun m => h_C_mul_T m a · exact fun m => h_C_mul_T_Z m a have B : ∀ s : Finset ℤ, M (s.sum fun n : ℤ => C (p.toFun n) * T n) := by apply Finset.induction · convert h_C 0 simp only [Finset.sum_empty, _root_.map_zero] · intro n s ns ih rw [Finset.sum_insert ns] exact h_add A ih convert B p.support ext a simp_rw [← single_eq_C_mul_T] -- Porting note: did not make progress in `simp_rw` rw [Finset.sum_apply'] simp_rw [Finsupp.single_apply, Finset.sum_ite_eq'] split_ifs with h · rfl · exact Finsupp.not_mem_support_iff.mp h #align laurent_polynomial.induction_on LaurentPolynomial.induction_on @[elab_as_elim] protected theorem induction_on' {M : R[T;T⁻¹] → Prop} (p : R[T;T⁻¹]) (h_add : ∀ p q, M p → M q → M (p + q)) (h_C_mul_T : ∀ (n : ℤ) (a : R), M (C a * T n)) : M p := by refine p.induction_on (fun a => ?_) (fun {p q} => h_add p q) ?_ ?_ <;> try exact fun n f _ => h_C_mul_T _ f convert h_C_mul_T 0 a exact (mul_one _).symm #align laurent_polynomial.induction_on' LaurentPolynomial.induction_on' theorem commute_T (n : ℤ) (f : R[T;T⁻¹]) : Commute (T n) f := f.induction_on' (fun p q Tp Tq => Commute.add_right Tp Tq) fun m a => show T n * _ = _ by rw [T, T, ← single_eq_C, single_mul_single, single_mul_single, single_mul_single] simp [add_comm] set_option linter.uppercaseLean3 false in #align laurent_polynomial.commute_T LaurentPolynomial.commute_T @[simp] theorem T_mul (n : ℤ) (f : R[T;T⁻¹]) : T n * f = f * T n := (commute_T n f).eq set_option linter.uppercaseLean3 false in #align laurent_polynomial.T_mul LaurentPolynomial.T_mul def trunc : R[T;T⁻¹] →+ R[X] := (toFinsuppIso R).symm.toAddMonoidHom.comp <\| comapDomain.addMonoidHom fun _ _ => Int.ofNat.inj #align laurent_polynomial.trunc LaurentPolynomial.trunc @[simp] theorem trunc_C_mul_T (n : ℤ) (r : R) : trunc (C r * T n) = ite (0 ≤ n) (monomial n.toNat r) 0 := by apply (toFinsuppIso R).injective rw [← single_eq_C_mul_T, trunc, AddMonoidHom.coe_comp, Function.comp_apply] -- Porting note (#10691): was `rw` erw [comapDomain.addMonoidHom_apply Int.ofNat_injective] rw [toFinsuppIso_apply] -- Porting note: rewrote proof below relative to mathlib3. by_cases n0 : 0 ≤ n · lift n to ℕ using n0 erw [comapDomain_single] simp only [Nat.cast_nonneg, Int.toNat_ofNat, ite_true, toFinsupp_monomial] · lift -n to ℕ using (neg_pos.mpr (not_le.mp n0)).le with m rw [toFinsupp_inj, if_neg n0] ext a have := ((not_le.mp n0).trans_le (Int.ofNat_zero_le a)).ne simp only [coeff_ofFinsupp, comapDomain_apply, Int.ofNat_eq_coe, coeff_zero, single_eq_of_ne this] set_option linter.uppercaseLean3 false in #align laurent_polynomial.trunc_C_mul_T LaurentPolynomial.trunc_C_mul_T @[simp] theorem leftInverse_trunc_toLaurent : Function.LeftInverse (trunc : R[T;T⁻¹] → R[X]) Polynomial.toLaurent := by refine fun f => f.induction_on' ?_ ?_ · intro f g hf hg simp only [hf, hg, _root_.map_add] · intro n r simp only [Polynomial.toLaurent_C_mul_T, trunc_C_mul_T, Int.natCast_nonneg, Int.toNat_natCast, if_true] #align laurent_polynomial.left_inverse_trunc_to_laurent LaurentPolynomial.leftInverse_trunc_toLaurent @[simp] theorem _root_.Polynomial.trunc_toLaurent (f : R[X]) : trunc (toLaurent f) = f := leftInverse_trunc_toLaurent _ #align polynomial.trunc_to_laurent Polynomial.trunc_toLaurent theorem _root_.Polynomial.toLaurent_injective : Function.Injective (Polynomial.toLaurent : R[X] → R[T;T⁻¹]) := leftInverse_trunc_toLaurent.injective #align polynomial.to_laurent_injective Polynomial.toLaurent_injective @[simp] theorem _root_.Polynomial.toLaurent_inj (f g : R[X]) : toLaurent f = toLaurent g ↔ f = g := ⟨fun h => Polynomial.toLaurent_injective h, congr_arg _⟩ #align polynomial.to_laurent_inj Polynomial.toLaurent_inj theorem _root_.Polynomial.toLaurent_ne_zero {f : R[X]} : f ≠ 0 ↔ toLaurent f ≠ 0 := (map_ne_zero_iff _ Polynomial.toLaurent_injective).symm #align polynomial.to_laurent_ne_zero Polynomial.toLaurent_ne_zero theorem exists_T_pow (f : R[T;T⁻¹]) : ∃ (n : ℕ) (f' : R[X]), toLaurent f' = f * T n := by refine f.induction_on' ?_ fun n a => ?_ <;> clear f · rintro f g ⟨m, fn, hf⟩ ⟨n, gn, hg⟩ refine ⟨m + n, fn * X ^ n + gn * X ^ m, ?_⟩ simp only [hf, hg, add_mul, add_comm (n : ℤ), map_add, map_mul, Polynomial.toLaurent_X_pow, mul_T_assoc, Int.ofNat_add] · cases' n with n n · exact ⟨0, Polynomial.C a * X ^ n, by simp⟩ · refine ⟨n + 1, Polynomial.C a, ?_⟩ simp only [Int.negSucc_eq, Polynomial.toLaurent_C, Int.ofNat_succ, mul_T_assoc, add_left_neg, T_zero, mul_one] set_option linter.uppercaseLean3 false in #align laurent_polynomial.exists_T_pow LaurentPolynomial.exists_T_pow @[elab_as_elim] theorem induction_on_mul_T {Q : R[T;T⁻¹] → Prop} (f : R[T;T⁻¹]) (Qf : ∀ {f : R[X]} {n : ℕ}, Q (toLaurent f * T (-n))) : Q f := by rcases f.exists_T_pow with ⟨n, f', hf⟩ rw [← mul_one f, ← T_zero, ← Nat.cast_zero, ← Nat.sub_self n, Nat.cast_sub rfl.le, T_sub, ← mul_assoc, ← hf] exact Qf set_option linter.uppercaseLean3 false in #align laurent_polynomial.induction_on_mul_T LaurentPolynomial.induction_on_mul_T	Mathlib/Algebra/Polynomial/Laurent.lean	431	437	theorem reduce_to_polynomial_of_mul_T (f : R[T;T⁻¹]) {Q : R[T;T⁻¹] → Prop} (Qf : ∀ f : R[X], Q (toLaurent f)) (QT : ∀ f, Q (f * T 1) → Q f) : Q f := by	induction' f using LaurentPolynomial.induction_on_mul_T with f n induction' n with n hn · simpa only [Nat.zero_eq, Nat.cast_zero, neg_zero, T_zero, mul_one] using Qf _ · convert QT _ _ simpa using hn
import Mathlib.Order.Filter.Prod #align_import order.filter.n_ary from "leanprover-community/mathlib"@"78f647f8517f021d839a7553d5dc97e79b508dea" open Function Set open Filter namespace Filter variable {α α' β β' γ γ' δ δ' ε ε' : Type*} {m : α → β → γ} {f f₁ f₂ : Filter α} {g g₁ g₂ : Filter β} {h h₁ h₂ : Filter γ} {s s₁ s₂ : Set α} {t t₁ t₂ : Set β} {u : Set γ} {v : Set δ} {a : α} {b : β} {c : γ} def map₂ (m : α → β → γ) (f : Filter α) (g : Filter β) : Filter γ := ((f ×ˢ g).map (uncurry m)).copy { s \| ∃ u ∈ f, ∃ v ∈ g, image2 m u v ⊆ s } fun _ ↦ by simp only [mem_map, mem_prod_iff, image2_subset_iff, prod_subset_iff]; rfl #align filter.map₂ Filter.map₂ @[simp 900] theorem mem_map₂_iff : u ∈ map₂ m f g ↔ ∃ s ∈ f, ∃ t ∈ g, image2 m s t ⊆ u := Iff.rfl #align filter.mem_map₂_iff Filter.mem_map₂_iff theorem image2_mem_map₂ (hs : s ∈ f) (ht : t ∈ g) : image2 m s t ∈ map₂ m f g := ⟨_, hs, _, ht, Subset.rfl⟩ #align filter.image2_mem_map₂ Filter.image2_mem_map₂ theorem map_prod_eq_map₂ (m : α → β → γ) (f : Filter α) (g : Filter β) : Filter.map (fun p : α × β => m p.1 p.2) (f ×ˢ g) = map₂ m f g := by rw [map₂, copy_eq, uncurry_def] #align filter.map_prod_eq_map₂ Filter.map_prod_eq_map₂ theorem map_prod_eq_map₂' (m : α × β → γ) (f : Filter α) (g : Filter β) : Filter.map m (f ×ˢ g) = map₂ (fun a b => m (a, b)) f g := map_prod_eq_map₂ (curry m) f g #align filter.map_prod_eq_map₂' Filter.map_prod_eq_map₂' @[simp] theorem map₂_mk_eq_prod (f : Filter α) (g : Filter β) : map₂ Prod.mk f g = f ×ˢ g := by simp only [← map_prod_eq_map₂, map_id'] #align filter.map₂_mk_eq_prod Filter.map₂_mk_eq_prod -- lemma image2_mem_map₂_iff (hm : injective2 m) : image2 m s t ∈ map₂ m f g ↔ s ∈ f ∧ t ∈ g := -- ⟨by { rintro ⟨u, v, hu, hv, h⟩, rw image2_subset_image2_iff hm at h, -- exact ⟨mem_of_superset hu h.1, mem_of_superset hv h.2⟩ }, λ h, image2_mem_map₂ h.1 h.2⟩ theorem map₂_mono (hf : f₁ ≤ f₂) (hg : g₁ ≤ g₂) : map₂ m f₁ g₁ ≤ map₂ m f₂ g₂ := fun _ ⟨s, hs, t, ht, hst⟩ => ⟨s, hf hs, t, hg ht, hst⟩ #align filter.map₂_mono Filter.map₂_mono theorem map₂_mono_left (h : g₁ ≤ g₂) : map₂ m f g₁ ≤ map₂ m f g₂ := map₂_mono Subset.rfl h #align filter.map₂_mono_left Filter.map₂_mono_left theorem map₂_mono_right (h : f₁ ≤ f₂) : map₂ m f₁ g ≤ map₂ m f₂ g := map₂_mono h Subset.rfl #align filter.map₂_mono_right Filter.map₂_mono_right @[simp] theorem le_map₂_iff {h : Filter γ} : h ≤ map₂ m f g ↔ ∀ ⦃s⦄, s ∈ f → ∀ ⦃t⦄, t ∈ g → image2 m s t ∈ h := ⟨fun H _ hs _ ht => H <\| image2_mem_map₂ hs ht, fun H _ ⟨_, hs, _, ht, hu⟩ => mem_of_superset (H hs ht) hu⟩ #align filter.le_map₂_iff Filter.le_map₂_iff @[simp] theorem map₂_eq_bot_iff : map₂ m f g = ⊥ ↔ f = ⊥ ∨ g = ⊥ := by simp [← map_prod_eq_map₂] #align filter.map₂_eq_bot_iff Filter.map₂_eq_bot_iff @[simp] theorem map₂_bot_left : map₂ m ⊥ g = ⊥ := map₂_eq_bot_iff.2 <\| .inl rfl #align filter.map₂_bot_left Filter.map₂_bot_left @[simp] theorem map₂_bot_right : map₂ m f ⊥ = ⊥ := map₂_eq_bot_iff.2 <\| .inr rfl #align filter.map₂_bot_right Filter.map₂_bot_right @[simp] theorem map₂_neBot_iff : (map₂ m f g).NeBot ↔ f.NeBot ∧ g.NeBot := by simp [neBot_iff, not_or] #align filter.map₂_ne_bot_iff Filter.map₂_neBot_iff protected theorem NeBot.map₂ (hf : f.NeBot) (hg : g.NeBot) : (map₂ m f g).NeBot := map₂_neBot_iff.2 ⟨hf, hg⟩ #align filter.ne_bot.map₂ Filter.NeBot.map₂ instance map₂.neBot [NeBot f] [NeBot g] : NeBot (map₂ m f g) := .map₂ ‹_› ‹_› theorem NeBot.of_map₂_left (h : (map₂ m f g).NeBot) : f.NeBot := (map₂_neBot_iff.1 h).1 #align filter.ne_bot.of_map₂_left Filter.NeBot.of_map₂_left theorem NeBot.of_map₂_right (h : (map₂ m f g).NeBot) : g.NeBot := (map₂_neBot_iff.1 h).2 #align filter.ne_bot.of_map₂_right Filter.NeBot.of_map₂_right theorem map₂_sup_left : map₂ m (f₁ ⊔ f₂) g = map₂ m f₁ g ⊔ map₂ m f₂ g := by simp_rw [← map_prod_eq_map₂, sup_prod, map_sup] #align filter.map₂_sup_left Filter.map₂_sup_left theorem map₂_sup_right : map₂ m f (g₁ ⊔ g₂) = map₂ m f g₁ ⊔ map₂ m f g₂ := by simp_rw [← map_prod_eq_map₂, prod_sup, map_sup] #align filter.map₂_sup_right Filter.map₂_sup_right theorem map₂_inf_subset_left : map₂ m (f₁ ⊓ f₂) g ≤ map₂ m f₁ g ⊓ map₂ m f₂ g := Monotone.map_inf_le (fun _ _ ↦ map₂_mono_right) f₁ f₂ #align filter.map₂_inf_subset_left Filter.map₂_inf_subset_left theorem map₂_inf_subset_right : map₂ m f (g₁ ⊓ g₂) ≤ map₂ m f g₁ ⊓ map₂ m f g₂ := Monotone.map_inf_le (fun _ _ ↦ map₂_mono_left) g₁ g₂ #align filter.map₂_inf_subset_right Filter.map₂_inf_subset_right @[simp] theorem map₂_pure_left : map₂ m (pure a) g = g.map (m a) := by rw [← map_prod_eq_map₂, pure_prod, map_map]; rfl #align filter.map₂_pure_left Filter.map₂_pure_left @[simp] theorem map₂_pure_right : map₂ m f (pure b) = f.map (m · b) := by rw [← map_prod_eq_map₂, prod_pure, map_map]; rfl #align filter.map₂_pure_right Filter.map₂_pure_right theorem map₂_pure : map₂ m (pure a) (pure b) = pure (m a b) := by rw [map₂_pure_right, map_pure] #align filter.map₂_pure Filter.map₂_pure theorem map₂_swap (m : α → β → γ) (f : Filter α) (g : Filter β) : map₂ m f g = map₂ (fun a b => m b a) g f := by rw [← map_prod_eq_map₂, prod_comm, map_map, ← map_prod_eq_map₂, Function.comp_def] #align filter.map₂_swap Filter.map₂_swap @[simp] theorem map₂_left [NeBot g] : map₂ (fun x _ => x) f g = f := by rw [← map_prod_eq_map₂, map_fst_prod] #align filter.map₂_left Filter.map₂_left @[simp] theorem map₂_right [NeBot f] : map₂ (fun _ y => y) f g = g := by rw [map₂_swap, map₂_left] #align filter.map₂_right Filter.map₂_right #noalign filter.map₃ #noalign filter.map₂_map₂_left #noalign filter.map₂_map₂_right theorem map_map₂ (m : α → β → γ) (n : γ → δ) : (map₂ m f g).map n = map₂ (fun a b => n (m a b)) f g := by rw [← map_prod_eq_map₂, ← map_prod_eq_map₂, map_map]; rfl #align filter.map_map₂ Filter.map_map₂ theorem map₂_map_left (m : γ → β → δ) (n : α → γ) : map₂ m (f.map n) g = map₂ (fun a b => m (n a) b) f g := by rw [← map_prod_eq_map₂, ← map_prod_eq_map₂, ← @map_id _ g, prod_map_map_eq, map_map, map_id]; rfl #align filter.map₂_map_left Filter.map₂_map_left theorem map₂_map_right (m : α → γ → δ) (n : β → γ) : map₂ m f (g.map n) = map₂ (fun a b => m a (n b)) f g := by rw [map₂_swap, map₂_map_left, map₂_swap] #align filter.map₂_map_right Filter.map₂_map_right @[simp] theorem map₂_curry (m : α × β → γ) (f : Filter α) (g : Filter β) : map₂ (curry m) f g = (f ×ˢ g).map m := (map_prod_eq_map₂' _ _ _).symm #align filter.map₂_curry Filter.map₂_curry @[simp] theorem map_uncurry_prod (m : α → β → γ) (f : Filter α) (g : Filter β) : (f ×ˢ g).map (uncurry m) = map₂ m f g := (map₂_curry (uncurry m) f g).symm #align filter.map_uncurry_prod Filter.map_uncurry_prod theorem map₂_assoc {m : δ → γ → ε} {n : α → β → δ} {m' : α → ε' → ε} {n' : β → γ → ε'} {h : Filter γ} (h_assoc : ∀ a b c, m (n a b) c = m' a (n' b c)) : map₂ m (map₂ n f g) h = map₂ m' f (map₂ n' g h) := by rw [← map_prod_eq_map₂ n, ← map_prod_eq_map₂ n', map₂_map_left, map₂_map_right, ← map_prod_eq_map₂, ← map_prod_eq_map₂, ← prod_assoc, map_map] simp only [h_assoc, Function.comp, Equiv.prodAssoc_apply] #align filter.map₂_assoc Filter.map₂_assoc theorem map₂_comm {n : β → α → γ} (h_comm : ∀ a b, m a b = n b a) : map₂ m f g = map₂ n g f := (map₂_swap _ _ _).trans <\| by simp_rw [h_comm] #align filter.map₂_comm Filter.map₂_comm theorem map₂_left_comm {m : α → δ → ε} {n : β → γ → δ} {m' : α → γ → δ'} {n' : β → δ' → ε} (h_left_comm : ∀ a b c, m a (n b c) = n' b (m' a c)) : map₂ m f (map₂ n g h) = map₂ n' g (map₂ m' f h) := by rw [map₂_swap m', map₂_swap m] exact map₂_assoc fun _ _ _ => h_left_comm _ _ _ #align filter.map₂_left_comm Filter.map₂_left_comm	Mathlib/Order/Filter/NAry.lean	223	227	theorem map₂_right_comm {m : δ → γ → ε} {n : α → β → δ} {m' : α → γ → δ'} {n' : δ' → β → ε} (h_right_comm : ∀ a b c, m (n a b) c = n' (m' a c) b) : map₂ m (map₂ n f g) h = map₂ n' (map₂ m' f h) g := by	rw [map₂_swap n, map₂_swap n'] exact map₂_assoc fun _ _ _ => h_right_comm _ _ _
import Mathlib.Analysis.SpecialFunctions.Complex.Circle import Mathlib.Geometry.Euclidean.Angle.Oriented.Basic #align_import geometry.euclidean.angle.oriented.rotation from "leanprover-community/mathlib"@"f0c8bf9245297a541f468be517f1bde6195105e9" noncomputable section open FiniteDimensional Complex open scoped Real RealInnerProductSpace ComplexConjugate namespace Orientation attribute [local instance] Complex.finrank_real_complex_fact variable {V V' : Type} variable [NormedAddCommGroup V] [NormedAddCommGroup V'] variable [InnerProductSpace ℝ V] [InnerProductSpace ℝ V'] variable [Fact (finrank ℝ V = 2)] [Fact (finrank ℝ V' = 2)] (o : Orientation ℝ V (Fin 2)) local notation "J" => o.rightAngleRotation def rotationAux (θ : Real.Angle) : V →ₗᵢ[ℝ] V := LinearMap.isometryOfInner (Real.Angle.cos θ • LinearMap.id + Real.Angle.sin θ • (LinearIsometryEquiv.toLinearEquiv J).toLinearMap) (by intro x y simp only [RCLike.conj_to_real, id, LinearMap.smul_apply, LinearMap.add_apply, LinearMap.id_coe, LinearEquiv.coe_coe, LinearIsometryEquiv.coe_toLinearEquiv, Orientation.areaForm_rightAngleRotation_left, Orientation.inner_rightAngleRotation_left, Orientation.inner_rightAngleRotation_right, inner_add_left, inner_smul_left, inner_add_right, inner_smul_right] linear_combination inner (𝕜 := ℝ) x y θ.cos_sq_add_sin_sq) #align orientation.rotation_aux Orientation.rotationAux @[simp] theorem rotationAux_apply (θ : Real.Angle) (x : V) : o.rotationAux θ x = Real.Angle.cos θ • x + Real.Angle.sin θ • J x := rfl #align orientation.rotation_aux_apply Orientation.rotationAux_apply def rotation (θ : Real.Angle) : V ≃ₗᵢ[ℝ] V := LinearIsometryEquiv.ofLinearIsometry (o.rotationAux θ) (Real.Angle.cos θ • LinearMap.id - Real.Angle.sin θ • (LinearIsometryEquiv.toLinearEquiv J).toLinearMap) (by ext x convert congr_arg (fun t : ℝ => t • x) θ.cos_sq_add_sin_sq using 1 · simp only [o.rightAngleRotation_rightAngleRotation, o.rotationAux_apply, Function.comp_apply, id, LinearEquiv.coe_coe, LinearIsometry.coe_toLinearMap, LinearIsometryEquiv.coe_toLinearEquiv, map_smul, map_sub, LinearMap.coe_comp, LinearMap.id_coe, LinearMap.smul_apply, LinearMap.sub_apply, ← mul_smul, add_smul, smul_add, smul_neg, smul_sub, mul_comm, sq] abel · simp) (by ext x convert congr_arg (fun t : ℝ => t • x) θ.cos_sq_add_sin_sq using 1 · simp only [o.rightAngleRotation_rightAngleRotation, o.rotationAux_apply, Function.comp_apply, id, LinearEquiv.coe_coe, LinearIsometry.coe_toLinearMap, LinearIsometryEquiv.coe_toLinearEquiv, map_add, map_smul, LinearMap.coe_comp, LinearMap.id_coe, LinearMap.smul_apply, LinearMap.sub_apply, add_smul, smul_neg, smul_sub, smul_smul] ring_nf abel · simp) #align orientation.rotation Orientation.rotation theorem rotation_apply (θ : Real.Angle) (x : V) : o.rotation θ x = Real.Angle.cos θ • x + Real.Angle.sin θ • J x := rfl #align orientation.rotation_apply Orientation.rotation_apply theorem rotation_symm_apply (θ : Real.Angle) (x : V) : (o.rotation θ).symm x = Real.Angle.cos θ • x - Real.Angle.sin θ • J x := rfl #align orientation.rotation_symm_apply Orientation.rotation_symm_apply theorem rotation_eq_matrix_toLin (θ : Real.Angle) {x : V} (hx : x ≠ 0) : (o.rotation θ).toLinearMap = Matrix.toLin (o.basisRightAngleRotation x hx) (o.basisRightAngleRotation x hx) !![θ.cos, -θ.sin; θ.sin, θ.cos] := by apply (o.basisRightAngleRotation x hx).ext intro i fin_cases i · rw [Matrix.toLin_self] simp [rotation_apply, Fin.sum_univ_succ] · rw [Matrix.toLin_self] simp [rotation_apply, Fin.sum_univ_succ, add_comm] #align orientation.rotation_eq_matrix_to_lin Orientation.rotation_eq_matrix_toLin @[simp] theorem det_rotation (θ : Real.Angle) : LinearMap.det (o.rotation θ).toLinearMap = 1 := by haveI : Nontrivial V := FiniteDimensional.nontrivial_of_finrank_eq_succ (@Fact.out (finrank ℝ V = 2) _) obtain ⟨x, hx⟩ : ∃ x, x ≠ (0 : V) := exists_ne (0 : V) rw [o.rotation_eq_matrix_toLin θ hx] simpa [sq] using θ.cos_sq_add_sin_sq #align orientation.det_rotation Orientation.det_rotation @[simp] theorem linearEquiv_det_rotation (θ : Real.Angle) : LinearEquiv.det (o.rotation θ).toLinearEquiv = 1 := Units.ext <\| by -- Porting note: Lean can't see through `LinearEquiv.coe_det` and needed the rewrite -- in mathlib3 this was just `units.ext <\| o.det_rotation θ` simpa only [LinearEquiv.coe_det, Units.val_one] using o.det_rotation θ #align orientation.linear_equiv_det_rotation Orientation.linearEquiv_det_rotation @[simp] theorem rotation_symm (θ : Real.Angle) : (o.rotation θ).symm = o.rotation (-θ) := by ext; simp [o.rotation_apply, o.rotation_symm_apply, sub_eq_add_neg] #align orientation.rotation_symm Orientation.rotation_symm @[simp] theorem rotation_zero : o.rotation 0 = LinearIsometryEquiv.refl ℝ V := by ext; simp [rotation] #align orientation.rotation_zero Orientation.rotation_zero @[simp] theorem rotation_pi : o.rotation π = LinearIsometryEquiv.neg ℝ := by ext x simp [rotation] #align orientation.rotation_pi Orientation.rotation_pi theorem rotation_pi_apply (x : V) : o.rotation π x = -x := by simp #align orientation.rotation_pi_apply Orientation.rotation_pi_apply theorem rotation_pi_div_two : o.rotation (π / 2 : ℝ) = J := by ext x simp [rotation] #align orientation.rotation_pi_div_two Orientation.rotation_pi_div_two @[simp] theorem rotation_rotation (θ₁ θ₂ : Real.Angle) (x : V) : o.rotation θ₁ (o.rotation θ₂ x) = o.rotation (θ₁ + θ₂) x := by simp only [o.rotation_apply, ← mul_smul, Real.Angle.cos_add, Real.Angle.sin_add, add_smul, sub_smul, LinearIsometryEquiv.trans_apply, smul_add, LinearIsometryEquiv.map_add, LinearIsometryEquiv.map_smul, rightAngleRotation_rightAngleRotation, smul_neg] ring_nf abel #align orientation.rotation_rotation Orientation.rotation_rotation @[simp] theorem rotation_trans (θ₁ θ₂ : Real.Angle) : (o.rotation θ₁).trans (o.rotation θ₂) = o.rotation (θ₂ + θ₁) := LinearIsometryEquiv.ext fun _ => by rw [← rotation_rotation, LinearIsometryEquiv.trans_apply] #align orientation.rotation_trans Orientation.rotation_trans @[simp] theorem kahler_rotation_left (x y : V) (θ : Real.Angle) : o.kahler (o.rotation θ x) y = conj (θ.expMapCircle : ℂ) * o.kahler x y := by -- Porting note: this needed the `Complex.conj_ofReal` instead of `RCLike.conj_ofReal`; -- I believe this is because the respective coercions are no longer defeq, and -- `Real.Angle.coe_expMapCircle` uses the `Complex` version. simp only [o.rotation_apply, map_add, map_mul, LinearMap.map_smulₛₗ, RingHom.id_apply, LinearMap.add_apply, LinearMap.smul_apply, real_smul, kahler_rightAngleRotation_left, Real.Angle.coe_expMapCircle, Complex.conj_ofReal, conj_I] ring #align orientation.kahler_rotation_left Orientation.kahler_rotation_left theorem neg_rotation (θ : Real.Angle) (x : V) : -o.rotation θ x = o.rotation (π + θ) x := by rw [← o.rotation_pi_apply, rotation_rotation] #align orientation.neg_rotation Orientation.neg_rotation @[simp] theorem neg_rotation_neg_pi_div_two (x : V) : -o.rotation (-π / 2 : ℝ) x = o.rotation (π / 2 : ℝ) x := by rw [neg_rotation, ← Real.Angle.coe_add, neg_div, ← sub_eq_add_neg, sub_half] #align orientation.neg_rotation_neg_pi_div_two Orientation.neg_rotation_neg_pi_div_two theorem neg_rotation_pi_div_two (x : V) : -o.rotation (π / 2 : ℝ) x = o.rotation (-π / 2 : ℝ) x := (neg_eq_iff_eq_neg.mp <\| o.neg_rotation_neg_pi_div_two _).symm #align orientation.neg_rotation_pi_div_two Orientation.neg_rotation_pi_div_two theorem kahler_rotation_left' (x y : V) (θ : Real.Angle) : o.kahler (o.rotation θ x) y = (-θ).expMapCircle * o.kahler x y := by simp only [Real.Angle.expMapCircle_neg, coe_inv_circle_eq_conj, kahler_rotation_left] #align orientation.kahler_rotation_left' Orientation.kahler_rotation_left' @[simp] theorem kahler_rotation_right (x y : V) (θ : Real.Angle) : o.kahler x (o.rotation θ y) = θ.expMapCircle * o.kahler x y := by simp only [o.rotation_apply, map_add, LinearMap.map_smulₛₗ, RingHom.id_apply, real_smul, kahler_rightAngleRotation_right, Real.Angle.coe_expMapCircle] ring #align orientation.kahler_rotation_right Orientation.kahler_rotation_right @[simp] theorem oangle_rotation_left {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) (θ : Real.Angle) : o.oangle (o.rotation θ x) y = o.oangle x y - θ := by simp only [oangle, o.kahler_rotation_left'] rw [Complex.arg_mul_coe_angle, Real.Angle.arg_expMapCircle] · abel · exact ne_zero_of_mem_circle _ · exact o.kahler_ne_zero hx hy #align orientation.oangle_rotation_left Orientation.oangle_rotation_left @[simp] theorem oangle_rotation_right {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) (θ : Real.Angle) : o.oangle x (o.rotation θ y) = o.oangle x y + θ := by simp only [oangle, o.kahler_rotation_right] rw [Complex.arg_mul_coe_angle, Real.Angle.arg_expMapCircle] · abel · exact ne_zero_of_mem_circle _ · exact o.kahler_ne_zero hx hy #align orientation.oangle_rotation_right Orientation.oangle_rotation_right @[simp] theorem oangle_rotation_self_left {x : V} (hx : x ≠ 0) (θ : Real.Angle) : o.oangle (o.rotation θ x) x = -θ := by simp [hx] #align orientation.oangle_rotation_self_left Orientation.oangle_rotation_self_left @[simp] theorem oangle_rotation_self_right {x : V} (hx : x ≠ 0) (θ : Real.Angle) : o.oangle x (o.rotation θ x) = θ := by simp [hx] #align orientation.oangle_rotation_self_right Orientation.oangle_rotation_self_right @[simp] theorem oangle_rotation_oangle_left (x y : V) : o.oangle (o.rotation (o.oangle x y) x) y = 0 := by by_cases hx : x = 0 · simp [hx] · by_cases hy : y = 0 · simp [hy] · simp [hx, hy] #align orientation.oangle_rotation_oangle_left Orientation.oangle_rotation_oangle_left @[simp] theorem oangle_rotation_oangle_right (x y : V) : o.oangle y (o.rotation (o.oangle x y) x) = 0 := by rw [oangle_rev] simp #align orientation.oangle_rotation_oangle_right Orientation.oangle_rotation_oangle_right @[simp] theorem oangle_rotation (x y : V) (θ : Real.Angle) : o.oangle (o.rotation θ x) (o.rotation θ y) = o.oangle x y := by by_cases hx : x = 0 <;> by_cases hy : y = 0 <;> simp [hx, hy] #align orientation.oangle_rotation Orientation.oangle_rotation @[simp]	Mathlib/Geometry/Euclidean/Angle/Oriented/Rotation.lean	285	292	theorem rotation_eq_self_iff_angle_eq_zero {x : V} (hx : x ≠ 0) (θ : Real.Angle) : o.rotation θ x = x ↔ θ = 0 := by	constructor · intro h rw [eq_comm] simpa [hx, h] using o.oangle_rotation_right hx hx θ · intro h simp [h]
import Mathlib.Geometry.Manifold.MFDeriv.FDeriv noncomputable section open scoped Manifold open Bundle Set Topology section SpecificFunctions variable {𝕜 : Type} [NontriviallyNormedField 𝕜] {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {H : Type} [TopologicalSpace H] (I : ModelWithCorners 𝕜 E H) {M : Type} [TopologicalSpace M] [ChartedSpace H M] [SmoothManifoldWithCorners I M] {E' : Type} [NormedAddCommGroup E'] [NormedSpace 𝕜 E'] {H' : Type} [TopologicalSpace H'] (I' : ModelWithCorners 𝕜 E' H') {M' : Type} [TopologicalSpace M'] [ChartedSpace H' M'] [SmoothManifoldWithCorners I' M'] {E'' : Type} [NormedAddCommGroup E''] [NormedSpace 𝕜 E''] {H'' : Type} [TopologicalSpace H''] (I'' : ModelWithCorners 𝕜 E'' H'') {M'' : Type} [TopologicalSpace M''] [ChartedSpace H'' M''] [SmoothManifoldWithCorners I'' M''] variable {s : Set M} {x : M} section Prod theorem hasMFDerivAt_fst (x : M × M') : HasMFDerivAt (I.prod I') I Prod.fst x (ContinuousLinearMap.fst 𝕜 (TangentSpace I x.1) (TangentSpace I' x.2)) := by refine ⟨continuous_fst.continuousAt, ?_⟩ have : ∀ᶠ y in 𝓝[range (I.prod I')] extChartAt (I.prod I') x x, (extChartAt I x.1 ∘ Prod.fst ∘ (extChartAt (I.prod I') x).symm) y = y.1 := by filter_upwards [extChartAt_target_mem_nhdsWithin (I.prod I') x] with y hy rw [extChartAt_prod] at hy exact (extChartAt I x.1).right_inv hy.1 apply HasFDerivWithinAt.congr_of_eventuallyEq hasFDerivWithinAt_fst this -- Porting note: next line was `simp only [mfld_simps]` exact (extChartAt I x.1).right_inv <\| (extChartAt I x.1).map_source (mem_extChartAt_source _ _) #align has_mfderiv_at_fst hasMFDerivAt_fst theorem hasMFDerivWithinAt_fst (s : Set (M × M')) (x : M × M') : HasMFDerivWithinAt (I.prod I') I Prod.fst s x (ContinuousLinearMap.fst 𝕜 (TangentSpace I x.1) (TangentSpace I' x.2)) := (hasMFDerivAt_fst I I' x).hasMFDerivWithinAt #align has_mfderiv_within_at_fst hasMFDerivWithinAt_fst theorem mdifferentiableAt_fst {x : M × M'} : MDifferentiableAt (I.prod I') I Prod.fst x := (hasMFDerivAt_fst I I' x).mdifferentiableAt #align mdifferentiable_at_fst mdifferentiableAt_fst theorem mdifferentiableWithinAt_fst {s : Set (M × M')} {x : M × M'} : MDifferentiableWithinAt (I.prod I') I Prod.fst s x := (mdifferentiableAt_fst I I').mdifferentiableWithinAt #align mdifferentiable_within_at_fst mdifferentiableWithinAt_fst theorem mdifferentiable_fst : MDifferentiable (I.prod I') I (Prod.fst : M × M' → M) := fun _ => mdifferentiableAt_fst I I' #align mdifferentiable_fst mdifferentiable_fst theorem mdifferentiableOn_fst {s : Set (M × M')} : MDifferentiableOn (I.prod I') I Prod.fst s := (mdifferentiable_fst I I').mdifferentiableOn #align mdifferentiable_on_fst mdifferentiableOn_fst @[simp, mfld_simps] theorem mfderiv_fst {x : M × M'} : mfderiv (I.prod I') I Prod.fst x = ContinuousLinearMap.fst 𝕜 (TangentSpace I x.1) (TangentSpace I' x.2) := (hasMFDerivAt_fst I I' x).mfderiv #align mfderiv_fst mfderiv_fst theorem mfderivWithin_fst {s : Set (M × M')} {x : M × M'} (hxs : UniqueMDiffWithinAt (I.prod I') s x) : mfderivWithin (I.prod I') I Prod.fst s x = ContinuousLinearMap.fst 𝕜 (TangentSpace I x.1) (TangentSpace I' x.2) := by rw [MDifferentiable.mfderivWithin (mdifferentiableAt_fst I I') hxs]; exact mfderiv_fst I I' #align mfderiv_within_fst mfderivWithin_fst @[simp, mfld_simps] theorem tangentMap_prod_fst {p : TangentBundle (I.prod I') (M × M')} : tangentMap (I.prod I') I Prod.fst p = ⟨p.proj.1, p.2.1⟩ := by -- Porting note: `rfl` wasn't needed simp [tangentMap]; rfl #align tangent_map_prod_fst tangentMap_prod_fst	Mathlib/Geometry/Manifold/MFDeriv/SpecificFunctions.lean	291	297	theorem tangentMapWithin_prod_fst {s : Set (M × M')} {p : TangentBundle (I.prod I') (M × M')} (hs : UniqueMDiffWithinAt (I.prod I') s p.proj) : tangentMapWithin (I.prod I') I Prod.fst s p = ⟨p.proj.1, p.2.1⟩ := by	simp only [tangentMapWithin] rw [mfderivWithin_fst] · rcases p with ⟨⟩; rfl · exact hs
import Mathlib.CategoryTheory.Limits.Shapes.ZeroMorphisms import Mathlib.CategoryTheory.Limits.Shapes.Kernels import Mathlib.CategoryTheory.Abelian.Basic import Mathlib.CategoryTheory.Subobject.Lattice import Mathlib.Order.Atoms #align_import category_theory.simple from "leanprover-community/mathlib"@"4ed0bcaef698011b0692b93a042a2282f490f6b6" noncomputable section open CategoryTheory.Limits namespace CategoryTheory universe v u variable {C : Type u} [Category.{v} C] section variable [HasZeroMorphisms C] class Simple (X : C) : Prop where mono_isIso_iff_nonzero : ∀ {Y : C} (f : Y ⟶ X) [Mono f], IsIso f ↔ f ≠ 0 #align category_theory.simple CategoryTheory.Simple theorem isIso_of_mono_of_nonzero {X Y : C} [Simple Y] {f : X ⟶ Y} [Mono f] (w : f ≠ 0) : IsIso f := (Simple.mono_isIso_iff_nonzero f).mpr w #align category_theory.is_iso_of_mono_of_nonzero CategoryTheory.isIso_of_mono_of_nonzero theorem Simple.of_iso {X Y : C} [Simple Y] (i : X ≅ Y) : Simple X := { mono_isIso_iff_nonzero := fun f m => by haveI : Mono (f ≫ i.hom) := mono_comp _ _ constructor · intro h w have j : IsIso (f ≫ i.hom) := by infer_instance rw [Simple.mono_isIso_iff_nonzero] at j subst w simp at j · intro h have j : IsIso (f ≫ i.hom) := by apply isIso_of_mono_of_nonzero intro w apply h simpa using (cancel_mono i.inv).2 w rw [← Category.comp_id f, ← i.hom_inv_id, ← Category.assoc] infer_instance } #align category_theory.simple.of_iso CategoryTheory.Simple.of_iso theorem Simple.iff_of_iso {X Y : C} (i : X ≅ Y) : Simple X ↔ Simple Y := ⟨fun _ => Simple.of_iso i.symm, fun _ => Simple.of_iso i⟩ #align category_theory.simple.iff_of_iso CategoryTheory.Simple.iff_of_iso theorem kernel_zero_of_nonzero_from_simple {X Y : C} [Simple X] {f : X ⟶ Y} [HasKernel f] (w : f ≠ 0) : kernel.ι f = 0 := by classical by_contra h haveI := isIso_of_mono_of_nonzero h exact w (eq_zero_of_epi_kernel f) #align category_theory.kernel_zero_of_nonzero_from_simple CategoryTheory.kernel_zero_of_nonzero_from_simple -- See also `mono_of_nonzero_from_simple`, which requires `Preadditive C`. theorem epi_of_nonzero_to_simple [HasEqualizers C] {X Y : C} [Simple Y] {f : X ⟶ Y} [HasImage f] (w : f ≠ 0) : Epi f := by rw [← image.fac f] haveI : IsIso (image.ι f) := isIso_of_mono_of_nonzero fun h => w (eq_zero_of_image_eq_zero h) apply epi_comp #align category_theory.epi_of_nonzero_to_simple CategoryTheory.epi_of_nonzero_to_simple theorem mono_to_simple_zero_of_not_iso {X Y : C} [Simple Y] {f : X ⟶ Y} [Mono f] (w : IsIso f → False) : f = 0 := by classical by_contra h exact w (isIso_of_mono_of_nonzero h) #align category_theory.mono_to_simple_zero_of_not_iso CategoryTheory.mono_to_simple_zero_of_not_iso theorem id_nonzero (X : C) [Simple.{v} X] : 𝟙 X ≠ 0 := (Simple.mono_isIso_iff_nonzero (𝟙 X)).mp (by infer_instance) #align category_theory.id_nonzero CategoryTheory.id_nonzero instance (X : C) [Simple.{v} X] : Nontrivial (End X) := nontrivial_of_ne 1 _ (id_nonzero X) section theorem Simple.not_isZero (X : C) [Simple X] : ¬IsZero X := by simpa [Limits.IsZero.iff_id_eq_zero] using id_nonzero X #align category_theory.simple.not_is_zero CategoryTheory.Simple.not_isZero variable [HasZeroObject C] open ZeroObject variable (C) theorem zero_not_simple [Simple (0 : C)] : False := (Simple.mono_isIso_iff_nonzero (0 : (0 : C) ⟶ (0 : C))).mp ⟨⟨0, by aesop_cat⟩⟩ rfl #align category_theory.zero_not_simple CategoryTheory.zero_not_simple end end -- We next make the dual arguments, but for this we must be in an abelian category. section Indecomposable variable [Preadditive C] [HasBinaryBiproducts C] -- There are another three potential variations of this lemma, -- but as any one suffices to prove `indecomposable_of_simple` we will not give them all.	Mathlib/CategoryTheory/Simple.lean	193	201	theorem Biprod.isIso_inl_iff_isZero (X Y : C) : IsIso (biprod.inl : X ⟶ X ⊞ Y) ↔ IsZero Y := by	rw [biprod.isIso_inl_iff_id_eq_fst_comp_inl, ← biprod.total, add_right_eq_self] constructor · intro h replace h := h =≫ biprod.snd simpa [← IsZero.iff_isSplitEpi_eq_zero (biprod.snd : X ⊞ Y ⟶ Y)] using h · intro h rw [IsZero.iff_isSplitEpi_eq_zero (biprod.snd : X ⊞ Y ⟶ Y)] at h rw [h, zero_comp]
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]	Mathlib/Analysis/SpecialFunctions/Trigonometric/Angle.lean	173	173	theorem coe_pi_add_coe_pi : (π : Real.Angle) + π = 0 := by	rw [← two_nsmul, two_nsmul_coe_pi]
import Mathlib.Algebra.Order.Ring.Abs import Mathlib.Data.ZMod.Basic #align_import data.zmod.parity from "leanprover-community/mathlib"@"048240e809f04e2bde02482ab44bc230744cc6c9" namespace ZMod theorem eq_zero_iff_even {n : ℕ} : (n : ZMod 2) = 0 ↔ Even n := (CharP.cast_eq_zero_iff (ZMod 2) 2 n).trans even_iff_two_dvd.symm #align zmod.eq_zero_iff_even ZMod.eq_zero_iff_even	Mathlib/Data/ZMod/Parity.lean	28	29	theorem eq_one_iff_odd {n : ℕ} : (n : ZMod 2) = 1 ↔ Odd n := by	rw [← @Nat.cast_one (ZMod 2), ZMod.eq_iff_modEq_nat, Nat.odd_iff, Nat.ModEq]
import Mathlib.Analysis.Calculus.Deriv.Add import Mathlib.Analysis.Calculus.Deriv.Linear import Mathlib.LinearAlgebra.AffineSpace.AffineMap variable {𝕜 : Type} [NontriviallyNormedField 𝕜] {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] (f : 𝕜 →ᵃ[𝕜] E) {a b : E} {L : Filter 𝕜} {s : Set 𝕜} {x : 𝕜} namespace AffineMap	Mathlib/Analysis/Calculus/Deriv/AffineMap.lean	32	34	theorem hasStrictDerivAt : HasStrictDerivAt f (f.linear 1) x := by	rw [f.decomp] exact f.linear.hasStrictDerivAt.add_const (f 0)
import Mathlib.Init.Control.Combinators import Mathlib.Data.Option.Defs import Mathlib.Logic.IsEmpty import Mathlib.Logic.Relator import Mathlib.Util.CompileInductive import Aesop #align_import data.option.basic from "leanprover-community/mathlib"@"f340f229b1f461aa1c8ee11e0a172d0a3b301a4a" universe u namespace Option variable {α β γ δ : Type} theorem coe_def : (fun a ↦ ↑a : α → Option α) = some := rfl #align option.coe_def Option.coe_def theorem mem_map {f : α → β} {y : β} {o : Option α} : y ∈ o.map f ↔ ∃ x ∈ o, f x = y := by simp #align option.mem_map Option.mem_map -- The simpNF linter says that the LHS can be simplified via `Option.mem_def`. -- 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} {o : Option α} : f a ∈ o.map f ↔ a ∈ o := by aesop theorem forall_mem_map {f : α → β} {o : Option α} {p : β → Prop} : (∀ y ∈ o.map f, p y) ↔ ∀ x ∈ o, p (f x) := by simp #align option.forall_mem_map Option.forall_mem_map theorem exists_mem_map {f : α → β} {o : Option α} {p : β → Prop} : (∃ y ∈ o.map f, p y) ↔ ∃ x ∈ o, p (f x) := by simp #align option.exists_mem_map Option.exists_mem_map theorem coe_get {o : Option α} (h : o.isSome) : ((Option.get _ h : α) : Option α) = o := Option.some_get h #align option.coe_get Option.coe_get theorem eq_of_mem_of_mem {a : α} {o1 o2 : Option α} (h1 : a ∈ o1) (h2 : a ∈ o2) : o1 = o2 := h1.trans h2.symm #align option.eq_of_mem_of_mem Option.eq_of_mem_of_mem theorem Mem.leftUnique : Relator.LeftUnique ((· ∈ ·) : α → Option α → Prop) := fun _ _ _=> mem_unique #align option.mem.left_unique Option.Mem.leftUnique theorem some_injective (α : Type) : Function.Injective (@some α) := fun _ _ ↦ some_inj.mp #align option.some_injective Option.some_injective theorem map_injective {f : α → β} (Hf : Function.Injective f) : Function.Injective (Option.map f) \| none, none, _ => rfl \| some a₁, some a₂, H => by rw [Hf (Option.some.inj H)] #align option.map_injective Option.map_injective @[simp] theorem map_comp_some (f : α → β) : Option.map f ∘ some = some ∘ f := rfl #align option.map_comp_some Option.map_comp_some @[simp] theorem none_bind' (f : α → Option β) : none.bind f = none := rfl #align option.none_bind' Option.none_bind' @[simp] theorem some_bind' (a : α) (f : α → Option β) : (some a).bind f = f a := rfl #align option.some_bind' Option.some_bind' theorem bind_eq_some' {x : Option α} {f : α → Option β} {b : β} : x.bind f = some b ↔ ∃ a, x = some a ∧ f a = some b := by cases x <;> simp #align option.bind_eq_some' Option.bind_eq_some' #align option.bind_eq_none' Option.bind_eq_none' theorem bind_congr {f g : α → Option β} {x : Option α} (h : ∀ a ∈ x, f a = g a) : x.bind f = x.bind g := by cases x <;> simp only [some_bind, none_bind, mem_def, h] @[congr] theorem bind_congr' {f g : α → Option β} {x y : Option α} (hx : x = y) (hf : ∀ a ∈ y, f a = g a) : x.bind f = y.bind g := hx.symm ▸ bind_congr hf theorem joinM_eq_join : joinM = @join α := funext fun _ ↦ rfl #align option.join_eq_join Option.joinM_eq_join theorem bind_eq_bind' {α β : Type u} {f : α → Option β} {x : Option α} : x >>= f = x.bind f := rfl #align option.bind_eq_bind Option.bind_eq_bind' theorem map_coe {α β} {a : α} {f : α → β} : f <$> (a : Option α) = ↑(f a) := rfl #align option.map_coe Option.map_coe @[simp] theorem map_coe' {a : α} {f : α → β} : Option.map f (a : Option α) = ↑(f a) := rfl #align option.map_coe' Option.map_coe' theorem map_injective' : Function.Injective (@Option.map α β) := fun f g h ↦ funext fun x ↦ some_injective _ <\| by simp only [← map_some', h] #align option.map_injective' Option.map_injective' @[simp] theorem map_inj {f g : α → β} : Option.map f = Option.map g ↔ f = g := map_injective'.eq_iff #align option.map_inj Option.map_inj attribute [simp] map_id @[simp] theorem map_eq_id {f : α → α} : Option.map f = id ↔ f = id := map_injective'.eq_iff' map_id #align option.map_eq_id Option.map_eq_id theorem map_comm {f₁ : α → β} {f₂ : α → γ} {g₁ : β → δ} {g₂ : γ → δ} (h : g₁ ∘ f₁ = g₂ ∘ f₂) (a : α) : (Option.map f₁ a).map g₁ = (Option.map f₂ a).map g₂ := by rw [map_map, h, ← map_map] #align option.map_comm Option.map_comm @[simp] theorem seq_some {α β} {a : α} {f : α → β} : some f <*> some a = some (f a) := rfl #align option.seq_some Option.seq_some @[simp] theorem some_orElse' (a : α) (x : Option α) : (some a).orElse (fun _ ↦ x) = some a := rfl #align option.some_orelse' Option.some_orElse' #align option.some_orelse Option.some_orElse @[simp] theorem none_orElse' (x : Option α) : none.orElse (fun _ ↦ x) = x := by cases x <;> rfl #align option.none_orelse' Option.none_orElse' #align option.none_orelse Option.none_orElse @[simp] theorem orElse_none' (x : Option α) : x.orElse (fun _ ↦ none) = x := by cases x <;> rfl #align option.orelse_none' Option.orElse_none' #align option.orelse_none Option.orElse_none #align option.is_some_none Option.isSome_none #align option.is_some_some Option.isSome_some #align option.is_some_iff_exists Option.isSome_iff_exists #align option.is_none_none Option.isNone_none #align option.is_none_some Option.isNone_some #align option.not_is_some Option.not_isSome #align option.not_is_some_iff_eq_none Option.not_isSome_iff_eq_none #align option.ne_none_iff_is_some Option.ne_none_iff_isSome theorem exists_ne_none {p : Option α → Prop} : (∃ x ≠ none, p x) ↔ (∃ x : α, p x) := by simp only [← exists_prop, bex_ne_none] @[simp] theorem isSome_map (f : α → β) (o : Option α) : isSome (o.map f) = isSome o := by cases o <;> rfl @[simp]	Mathlib/Data/Option/Basic.lean	330	332	theorem get_map (f : α → β) {o : Option α} (h : isSome (o.map f)) : (o.map f).get h = f (o.get (by rwa [← isSome_map])) := by	cases o <;> [simp at h; rfl]
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] 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] #align real.angle.coe_to_Ico_mod Real.Angle.coe_toIcoMod @[simp] theorem coe_toIocMod (θ ψ : ℝ) : ↑(toIocMod two_pi_pos ψ θ) = (θ : Angle) := by rw [angle_eq_iff_two_pi_dvd_sub] refine ⟨-toIocDiv two_pi_pos ψ θ, ?_⟩ rw [toIocMod_sub_self, zsmul_eq_mul, mul_comm] #align real.angle.coe_to_Ioc_mod Real.Angle.coe_toIocMod def toReal (θ : Angle) : ℝ := (toIocMod_periodic two_pi_pos (-π)).lift θ #align real.angle.to_real Real.Angle.toReal theorem toReal_coe (θ : ℝ) : (θ : Angle).toReal = toIocMod two_pi_pos (-π) θ := rfl #align real.angle.to_real_coe Real.Angle.toReal_coe theorem toReal_coe_eq_self_iff {θ : ℝ} : (θ : Angle).toReal = θ ↔ -π < θ ∧ θ ≤ π := by rw [toReal_coe, toIocMod_eq_self two_pi_pos] ring_nf rfl #align real.angle.to_real_coe_eq_self_iff Real.Angle.toReal_coe_eq_self_iff theorem toReal_coe_eq_self_iff_mem_Ioc {θ : ℝ} : (θ : Angle).toReal = θ ↔ θ ∈ Set.Ioc (-π) π := by rw [toReal_coe_eq_self_iff, ← Set.mem_Ioc] #align real.angle.to_real_coe_eq_self_iff_mem_Ioc Real.Angle.toReal_coe_eq_self_iff_mem_Ioc theorem toReal_injective : Function.Injective toReal := by intro θ ψ h induction θ using Real.Angle.induction_on induction ψ using Real.Angle.induction_on simpa [toReal_coe, toIocMod_eq_toIocMod, zsmul_eq_mul, mul_comm _ (2 * π), ← angle_eq_iff_two_pi_dvd_sub, eq_comm] using h #align real.angle.to_real_injective Real.Angle.toReal_injective @[simp] theorem toReal_inj {θ ψ : Angle} : θ.toReal = ψ.toReal ↔ θ = ψ := toReal_injective.eq_iff #align real.angle.to_real_inj Real.Angle.toReal_inj @[simp] theorem coe_toReal (θ : Angle) : (θ.toReal : Angle) = θ := by induction θ using Real.Angle.induction_on exact coe_toIocMod _ _ #align real.angle.coe_to_real Real.Angle.coe_toReal theorem neg_pi_lt_toReal (θ : Angle) : -π < θ.toReal := by induction θ using Real.Angle.induction_on exact left_lt_toIocMod _ _ _ #align real.angle.neg_pi_lt_to_real Real.Angle.neg_pi_lt_toReal theorem toReal_le_pi (θ : Angle) : θ.toReal ≤ π := by induction θ using Real.Angle.induction_on convert toIocMod_le_right two_pi_pos _ _ ring #align real.angle.to_real_le_pi Real.Angle.toReal_le_pi theorem abs_toReal_le_pi (θ : Angle) : \|θ.toReal\| ≤ π := abs_le.2 ⟨(neg_pi_lt_toReal _).le, toReal_le_pi _⟩ #align real.angle.abs_to_real_le_pi Real.Angle.abs_toReal_le_pi theorem toReal_mem_Ioc (θ : Angle) : θ.toReal ∈ Set.Ioc (-π) π := ⟨neg_pi_lt_toReal _, toReal_le_pi _⟩ #align real.angle.to_real_mem_Ioc Real.Angle.toReal_mem_Ioc @[simp] theorem toIocMod_toReal (θ : Angle) : toIocMod two_pi_pos (-π) θ.toReal = θ.toReal := by induction θ using Real.Angle.induction_on rw [toReal_coe] exact toIocMod_toIocMod _ _ _ _ #align real.angle.to_Ioc_mod_to_real Real.Angle.toIocMod_toReal @[simp] theorem toReal_zero : (0 : Angle).toReal = 0 := by rw [← coe_zero, toReal_coe_eq_self_iff] exact ⟨Left.neg_neg_iff.2 Real.pi_pos, Real.pi_pos.le⟩ #align real.angle.to_real_zero Real.Angle.toReal_zero @[simp] theorem toReal_eq_zero_iff {θ : Angle} : θ.toReal = 0 ↔ θ = 0 := by nth_rw 1 [← toReal_zero] exact toReal_inj #align real.angle.to_real_eq_zero_iff Real.Angle.toReal_eq_zero_iff @[simp] theorem toReal_pi : (π : Angle).toReal = π := by rw [toReal_coe_eq_self_iff] exact ⟨Left.neg_lt_self Real.pi_pos, le_refl _⟩ #align real.angle.to_real_pi Real.Angle.toReal_pi @[simp] theorem toReal_eq_pi_iff {θ : Angle} : θ.toReal = π ↔ θ = π := by rw [← toReal_inj, toReal_pi] #align real.angle.to_real_eq_pi_iff Real.Angle.toReal_eq_pi_iff theorem pi_ne_zero : (π : Angle) ≠ 0 := by rw [← toReal_injective.ne_iff, toReal_pi, toReal_zero] exact Real.pi_ne_zero #align real.angle.pi_ne_zero Real.Angle.pi_ne_zero @[simp] theorem toReal_pi_div_two : ((π / 2 : ℝ) : Angle).toReal = π / 2 := toReal_coe_eq_self_iff.2 <\| by constructor <;> linarith [pi_pos] #align real.angle.to_real_pi_div_two Real.Angle.toReal_pi_div_two @[simp] theorem toReal_eq_pi_div_two_iff {θ : Angle} : θ.toReal = π / 2 ↔ θ = (π / 2 : ℝ) := by rw [← toReal_inj, toReal_pi_div_two] #align real.angle.to_real_eq_pi_div_two_iff Real.Angle.toReal_eq_pi_div_two_iff @[simp] theorem toReal_neg_pi_div_two : ((-π / 2 : ℝ) : Angle).toReal = -π / 2 := toReal_coe_eq_self_iff.2 <\| by constructor <;> linarith [pi_pos] #align real.angle.to_real_neg_pi_div_two Real.Angle.toReal_neg_pi_div_two @[simp] theorem toReal_eq_neg_pi_div_two_iff {θ : Angle} : θ.toReal = -π / 2 ↔ θ = (-π / 2 : ℝ) := by rw [← toReal_inj, toReal_neg_pi_div_two] #align real.angle.to_real_eq_neg_pi_div_two_iff Real.Angle.toReal_eq_neg_pi_div_two_iff theorem pi_div_two_ne_zero : ((π / 2 : ℝ) : Angle) ≠ 0 := by rw [← toReal_injective.ne_iff, toReal_pi_div_two, toReal_zero] exact div_ne_zero Real.pi_ne_zero two_ne_zero #align real.angle.pi_div_two_ne_zero Real.Angle.pi_div_two_ne_zero theorem neg_pi_div_two_ne_zero : ((-π / 2 : ℝ) : Angle) ≠ 0 := by rw [← toReal_injective.ne_iff, toReal_neg_pi_div_two, toReal_zero] exact div_ne_zero (neg_ne_zero.2 Real.pi_ne_zero) two_ne_zero #align real.angle.neg_pi_div_two_ne_zero Real.Angle.neg_pi_div_two_ne_zero theorem abs_toReal_coe_eq_self_iff {θ : ℝ} : \|(θ : Angle).toReal\| = θ ↔ 0 ≤ θ ∧ θ ≤ π := ⟨fun h => h ▸ ⟨abs_nonneg _, abs_toReal_le_pi _⟩, fun h => (toReal_coe_eq_self_iff.2 ⟨(Left.neg_neg_iff.2 Real.pi_pos).trans_le h.1, h.2⟩).symm ▸ abs_eq_self.2 h.1⟩ #align real.angle.abs_to_real_coe_eq_self_iff Real.Angle.abs_toReal_coe_eq_self_iff theorem abs_toReal_neg_coe_eq_self_iff {θ : ℝ} : \|(-θ : Angle).toReal\| = θ ↔ 0 ≤ θ ∧ θ ≤ π := by refine ⟨fun h => h ▸ ⟨abs_nonneg _, abs_toReal_le_pi _⟩, fun h => ?_⟩ by_cases hnegpi : θ = π; · simp [hnegpi, Real.pi_pos.le] rw [← coe_neg, toReal_coe_eq_self_iff.2 ⟨neg_lt_neg (lt_of_le_of_ne h.2 hnegpi), (neg_nonpos.2 h.1).trans Real.pi_pos.le⟩, abs_neg, abs_eq_self.2 h.1] #align real.angle.abs_to_real_neg_coe_eq_self_iff Real.Angle.abs_toReal_neg_coe_eq_self_iff theorem abs_toReal_eq_pi_div_two_iff {θ : Angle} : \|θ.toReal\| = π / 2 ↔ θ = (π / 2 : ℝ) ∨ θ = (-π / 2 : ℝ) := by rw [abs_eq (div_nonneg Real.pi_pos.le two_pos.le), ← neg_div, toReal_eq_pi_div_two_iff, toReal_eq_neg_pi_div_two_iff] #align real.angle.abs_to_real_eq_pi_div_two_iff Real.Angle.abs_toReal_eq_pi_div_two_iff theorem nsmul_toReal_eq_mul {n : ℕ} (h : n ≠ 0) {θ : Angle} : (n • θ).toReal = n * θ.toReal ↔ θ.toReal ∈ Set.Ioc (-π / n) (π / n) := by nth_rw 1 [← coe_toReal θ] have h' : 0 < (n : ℝ) := mod_cast Nat.pos_of_ne_zero h rw [← coe_nsmul, nsmul_eq_mul, toReal_coe_eq_self_iff, Set.mem_Ioc, div_lt_iff' h', le_div_iff' h'] #align real.angle.nsmul_to_real_eq_mul Real.Angle.nsmul_toReal_eq_mul theorem two_nsmul_toReal_eq_two_mul {θ : Angle} : ((2 : ℕ) • θ).toReal = 2 * θ.toReal ↔ θ.toReal ∈ Set.Ioc (-π / 2) (π / 2) := mod_cast nsmul_toReal_eq_mul two_ne_zero #align real.angle.two_nsmul_to_real_eq_two_mul Real.Angle.two_nsmul_toReal_eq_two_mul theorem two_zsmul_toReal_eq_two_mul {θ : Angle} : ((2 : ℤ) • θ).toReal = 2 * θ.toReal ↔ θ.toReal ∈ Set.Ioc (-π / 2) (π / 2) := by rw [two_zsmul, ← two_nsmul, two_nsmul_toReal_eq_two_mul] #align real.angle.two_zsmul_to_real_eq_two_mul Real.Angle.two_zsmul_toReal_eq_two_mul theorem toReal_coe_eq_self_sub_two_mul_int_mul_pi_iff {θ : ℝ} {k : ℤ} : (θ : Angle).toReal = θ - 2 * k * π ↔ θ ∈ Set.Ioc ((2 * k - 1 : ℝ) * π) ((2 * k + 1) * π) := by rw [← sub_zero (θ : Angle), ← zsmul_zero k, ← coe_two_pi, ← coe_zsmul, ← coe_sub, zsmul_eq_mul, ← mul_assoc, mul_comm (k : ℝ), toReal_coe_eq_self_iff, Set.mem_Ioc] exact ⟨fun h => ⟨by linarith, by linarith⟩, fun h => ⟨by linarith, by linarith⟩⟩ #align real.angle.to_real_coe_eq_self_sub_two_mul_int_mul_pi_iff Real.Angle.toReal_coe_eq_self_sub_two_mul_int_mul_pi_iff theorem toReal_coe_eq_self_sub_two_pi_iff {θ : ℝ} : (θ : Angle).toReal = θ - 2 * π ↔ θ ∈ Set.Ioc π (3 * π) := by convert @toReal_coe_eq_self_sub_two_mul_int_mul_pi_iff θ 1 <;> norm_num #align real.angle.to_real_coe_eq_self_sub_two_pi_iff Real.Angle.toReal_coe_eq_self_sub_two_pi_iff theorem toReal_coe_eq_self_add_two_pi_iff {θ : ℝ} : (θ : Angle).toReal = θ + 2 * π ↔ θ ∈ Set.Ioc (-3 * π) (-π) := by convert @toReal_coe_eq_self_sub_two_mul_int_mul_pi_iff θ (-1) using 2 <;> set_option tactic.skipAssignedInstances false in norm_num #align real.angle.to_real_coe_eq_self_add_two_pi_iff Real.Angle.toReal_coe_eq_self_add_two_pi_iff theorem two_nsmul_toReal_eq_two_mul_sub_two_pi {θ : Angle} : ((2 : ℕ) • θ).toReal = 2 * θ.toReal - 2 * π ↔ π / 2 < θ.toReal := by nth_rw 1 [← coe_toReal θ] rw [← coe_nsmul, two_nsmul, ← two_mul, toReal_coe_eq_self_sub_two_pi_iff, Set.mem_Ioc] exact ⟨fun h => by linarith, fun h => ⟨(div_lt_iff' (zero_lt_two' ℝ)).1 h, by linarith [pi_pos, toReal_le_pi θ]⟩⟩ #align real.angle.two_nsmul_to_real_eq_two_mul_sub_two_pi Real.Angle.two_nsmul_toReal_eq_two_mul_sub_two_pi theorem two_zsmul_toReal_eq_two_mul_sub_two_pi {θ : Angle} : ((2 : ℤ) • θ).toReal = 2 * θ.toReal - 2 * π ↔ π / 2 < θ.toReal := by rw [two_zsmul, ← two_nsmul, two_nsmul_toReal_eq_two_mul_sub_two_pi] #align real.angle.two_zsmul_to_real_eq_two_mul_sub_two_pi Real.Angle.two_zsmul_toReal_eq_two_mul_sub_two_pi theorem two_nsmul_toReal_eq_two_mul_add_two_pi {θ : Angle} : ((2 : ℕ) • θ).toReal = 2 * θ.toReal + 2 * π ↔ θ.toReal ≤ -π / 2 := by nth_rw 1 [← coe_toReal θ] rw [← coe_nsmul, two_nsmul, ← two_mul, toReal_coe_eq_self_add_two_pi_iff, Set.mem_Ioc] refine ⟨fun h => by linarith, fun h => ⟨by linarith [pi_pos, neg_pi_lt_toReal θ], (le_div_iff' (zero_lt_two' ℝ)).1 h⟩⟩ #align real.angle.two_nsmul_to_real_eq_two_mul_add_two_pi Real.Angle.two_nsmul_toReal_eq_two_mul_add_two_pi theorem two_zsmul_toReal_eq_two_mul_add_two_pi {θ : Angle} : ((2 : ℤ) • θ).toReal = 2 * θ.toReal + 2 * π ↔ θ.toReal ≤ -π / 2 := by rw [two_zsmul, ← two_nsmul, two_nsmul_toReal_eq_two_mul_add_two_pi] #align real.angle.two_zsmul_to_real_eq_two_mul_add_two_pi Real.Angle.two_zsmul_toReal_eq_two_mul_add_two_pi @[simp] theorem sin_toReal (θ : Angle) : Real.sin θ.toReal = sin θ := by conv_rhs => rw [← coe_toReal θ, sin_coe] #align real.angle.sin_to_real Real.Angle.sin_toReal @[simp] theorem cos_toReal (θ : Angle) : Real.cos θ.toReal = cos θ := by conv_rhs => rw [← coe_toReal θ, cos_coe] #align real.angle.cos_to_real Real.Angle.cos_toReal theorem cos_nonneg_iff_abs_toReal_le_pi_div_two {θ : Angle} : 0 ≤ cos θ ↔ \|θ.toReal\| ≤ π / 2 := by nth_rw 1 [← coe_toReal θ] rw [abs_le, cos_coe] refine ⟨fun h => ?_, cos_nonneg_of_mem_Icc⟩ by_contra hn rw [not_and_or, not_le, not_le] at hn refine (not_lt.2 h) ?_ rcases hn with (hn \| hn) · rw [← Real.cos_neg] refine cos_neg_of_pi_div_two_lt_of_lt (by linarith) ?_ linarith [neg_pi_lt_toReal θ] · refine cos_neg_of_pi_div_two_lt_of_lt hn ?_ linarith [toReal_le_pi θ] #align real.angle.cos_nonneg_iff_abs_to_real_le_pi_div_two Real.Angle.cos_nonneg_iff_abs_toReal_le_pi_div_two theorem cos_pos_iff_abs_toReal_lt_pi_div_two {θ : Angle} : 0 < cos θ ↔ \|θ.toReal\| < π / 2 := by rw [lt_iff_le_and_ne, lt_iff_le_and_ne, cos_nonneg_iff_abs_toReal_le_pi_div_two, ← and_congr_right] rintro - rw [Ne, Ne, not_iff_not, @eq_comm ℝ 0, abs_toReal_eq_pi_div_two_iff, cos_eq_zero_iff] #align real.angle.cos_pos_iff_abs_to_real_lt_pi_div_two Real.Angle.cos_pos_iff_abs_toReal_lt_pi_div_two theorem cos_neg_iff_pi_div_two_lt_abs_toReal {θ : Angle} : cos θ < 0 ↔ π / 2 < \|θ.toReal\| := by rw [← not_le, ← not_le, not_iff_not, cos_nonneg_iff_abs_toReal_le_pi_div_two] #align real.angle.cos_neg_iff_pi_div_two_lt_abs_to_real Real.Angle.cos_neg_iff_pi_div_two_lt_abs_toReal theorem abs_cos_eq_abs_sin_of_two_nsmul_add_two_nsmul_eq_pi {θ ψ : Angle} (h : (2 : ℕ) • θ + (2 : ℕ) • ψ = π) : \|cos θ\| = \|sin ψ\| := by rw [← eq_sub_iff_add_eq, ← two_nsmul_coe_div_two, ← nsmul_sub, two_nsmul_eq_iff] at h rcases h with (rfl \| rfl) <;> simp [cos_pi_div_two_sub] #align real.angle.abs_cos_eq_abs_sin_of_two_nsmul_add_two_nsmul_eq_pi Real.Angle.abs_cos_eq_abs_sin_of_two_nsmul_add_two_nsmul_eq_pi theorem abs_cos_eq_abs_sin_of_two_zsmul_add_two_zsmul_eq_pi {θ ψ : Angle} (h : (2 : ℤ) • θ + (2 : ℤ) • ψ = π) : \|cos θ\| = \|sin ψ\| := by simp_rw [two_zsmul, ← two_nsmul] at h exact abs_cos_eq_abs_sin_of_two_nsmul_add_two_nsmul_eq_pi h #align real.angle.abs_cos_eq_abs_sin_of_two_zsmul_add_two_zsmul_eq_pi Real.Angle.abs_cos_eq_abs_sin_of_two_zsmul_add_two_zsmul_eq_pi def tan (θ : Angle) : ℝ := sin θ / cos θ #align real.angle.tan Real.Angle.tan theorem tan_eq_sin_div_cos (θ : Angle) : tan θ = sin θ / cos θ := rfl #align real.angle.tan_eq_sin_div_cos Real.Angle.tan_eq_sin_div_cos @[simp] theorem tan_coe (x : ℝ) : tan (x : Angle) = Real.tan x := by rw [tan, sin_coe, cos_coe, Real.tan_eq_sin_div_cos] #align real.angle.tan_coe Real.Angle.tan_coe @[simp] theorem tan_zero : tan (0 : Angle) = 0 := by rw [← coe_zero, tan_coe, Real.tan_zero] #align real.angle.tan_zero Real.Angle.tan_zero -- Porting note (#10618): @[simp] can now prove it theorem tan_coe_pi : tan (π : Angle) = 0 := by rw [tan_coe, Real.tan_pi] #align real.angle.tan_coe_pi Real.Angle.tan_coe_pi theorem tan_periodic : Function.Periodic tan (π : Angle) := by intro θ induction θ using Real.Angle.induction_on rw [← coe_add, tan_coe, tan_coe] exact Real.tan_periodic _ #align real.angle.tan_periodic Real.Angle.tan_periodic @[simp] theorem tan_add_pi (θ : Angle) : tan (θ + π) = tan θ := tan_periodic θ #align real.angle.tan_add_pi Real.Angle.tan_add_pi @[simp] theorem tan_sub_pi (θ : Angle) : tan (θ - π) = tan θ := tan_periodic.sub_eq θ #align real.angle.tan_sub_pi Real.Angle.tan_sub_pi @[simp] theorem tan_toReal (θ : Angle) : Real.tan θ.toReal = tan θ := by conv_rhs => rw [← coe_toReal θ, tan_coe] #align real.angle.tan_to_real Real.Angle.tan_toReal theorem tan_eq_of_two_nsmul_eq {θ ψ : Angle} (h : (2 : ℕ) • θ = (2 : ℕ) • ψ) : tan θ = tan ψ := by rw [two_nsmul_eq_iff] at h rcases h with (rfl \| rfl) · rfl · exact tan_add_pi _ #align real.angle.tan_eq_of_two_nsmul_eq Real.Angle.tan_eq_of_two_nsmul_eq theorem tan_eq_of_two_zsmul_eq {θ ψ : Angle} (h : (2 : ℤ) • θ = (2 : ℤ) • ψ) : tan θ = tan ψ := by simp_rw [two_zsmul, ← two_nsmul] at h exact tan_eq_of_two_nsmul_eq h #align real.angle.tan_eq_of_two_zsmul_eq Real.Angle.tan_eq_of_two_zsmul_eq theorem tan_eq_inv_of_two_nsmul_add_two_nsmul_eq_pi {θ ψ : Angle} (h : (2 : ℕ) • θ + (2 : ℕ) • ψ = π) : tan ψ = (tan θ)⁻¹ := by induction θ using Real.Angle.induction_on induction ψ using Real.Angle.induction_on rw [← smul_add, ← coe_add, ← coe_nsmul, two_nsmul, ← two_mul, angle_eq_iff_two_pi_dvd_sub] at h rcases h with ⟨k, h⟩ rw [sub_eq_iff_eq_add, ← mul_inv_cancel_left₀ two_ne_zero π, mul_assoc, ← mul_add, mul_right_inj' (two_ne_zero' ℝ), ← eq_sub_iff_add_eq', mul_inv_cancel_left₀ two_ne_zero π, inv_mul_eq_div, mul_comm] at h rw [tan_coe, tan_coe, ← tan_pi_div_two_sub, h, add_sub_assoc, add_comm] exact Real.tan_periodic.int_mul _ _ #align real.angle.tan_eq_inv_of_two_nsmul_add_two_nsmul_eq_pi Real.Angle.tan_eq_inv_of_two_nsmul_add_two_nsmul_eq_pi theorem tan_eq_inv_of_two_zsmul_add_two_zsmul_eq_pi {θ ψ : Angle} (h : (2 : ℤ) • θ + (2 : ℤ) • ψ = π) : tan ψ = (tan θ)⁻¹ := by simp_rw [two_zsmul, ← two_nsmul] at h exact tan_eq_inv_of_two_nsmul_add_two_nsmul_eq_pi h #align real.angle.tan_eq_inv_of_two_zsmul_add_two_zsmul_eq_pi Real.Angle.tan_eq_inv_of_two_zsmul_add_two_zsmul_eq_pi def sign (θ : Angle) : SignType := SignType.sign (sin θ) #align real.angle.sign Real.Angle.sign @[simp] theorem sign_zero : (0 : Angle).sign = 0 := by rw [sign, sin_zero, _root_.sign_zero] #align real.angle.sign_zero Real.Angle.sign_zero @[simp] theorem sign_coe_pi : (π : Angle).sign = 0 := by rw [sign, sin_coe_pi, _root_.sign_zero] #align real.angle.sign_coe_pi Real.Angle.sign_coe_pi @[simp] theorem sign_neg (θ : Angle) : (-θ).sign = -θ.sign := by simp_rw [sign, sin_neg, Left.sign_neg] #align real.angle.sign_neg Real.Angle.sign_neg theorem sign_antiperiodic : Function.Antiperiodic sign (π : Angle) := fun θ => by rw [sign, sign, sin_add_pi, Left.sign_neg] #align real.angle.sign_antiperiodic Real.Angle.sign_antiperiodic @[simp] theorem sign_add_pi (θ : Angle) : (θ + π).sign = -θ.sign := sign_antiperiodic θ #align real.angle.sign_add_pi Real.Angle.sign_add_pi @[simp] theorem sign_pi_add (θ : Angle) : ((π : Angle) + θ).sign = -θ.sign := by rw [add_comm, sign_add_pi] #align real.angle.sign_pi_add Real.Angle.sign_pi_add @[simp] theorem sign_sub_pi (θ : Angle) : (θ - π).sign = -θ.sign := sign_antiperiodic.sub_eq θ #align real.angle.sign_sub_pi Real.Angle.sign_sub_pi @[simp] theorem sign_pi_sub (θ : Angle) : ((π : Angle) - θ).sign = θ.sign := by simp [sign_antiperiodic.sub_eq'] #align real.angle.sign_pi_sub Real.Angle.sign_pi_sub theorem sign_eq_zero_iff {θ : Angle} : θ.sign = 0 ↔ θ = 0 ∨ θ = π := by rw [sign, _root_.sign_eq_zero_iff, sin_eq_zero_iff] #align real.angle.sign_eq_zero_iff Real.Angle.sign_eq_zero_iff theorem sign_ne_zero_iff {θ : Angle} : θ.sign ≠ 0 ↔ θ ≠ 0 ∧ θ ≠ π := by rw [← not_or, ← sign_eq_zero_iff] #align real.angle.sign_ne_zero_iff Real.Angle.sign_ne_zero_iff theorem toReal_neg_iff_sign_neg {θ : Angle} : θ.toReal < 0 ↔ θ.sign = -1 := by rw [sign, ← sin_toReal, sign_eq_neg_one_iff] rcases lt_trichotomy θ.toReal 0 with (h \| h \| h) · exact ⟨fun _ => Real.sin_neg_of_neg_of_neg_pi_lt h (neg_pi_lt_toReal θ), fun _ => h⟩ · simp [h] · exact ⟨fun hn => False.elim (h.asymm hn), fun hn => False.elim (hn.not_le (sin_nonneg_of_nonneg_of_le_pi h.le (toReal_le_pi θ)))⟩ #align real.angle.to_real_neg_iff_sign_neg Real.Angle.toReal_neg_iff_sign_neg theorem toReal_nonneg_iff_sign_nonneg {θ : Angle} : 0 ≤ θ.toReal ↔ 0 ≤ θ.sign := by rcases lt_trichotomy θ.toReal 0 with (h \| h \| h) · refine ⟨fun hn => False.elim (h.not_le hn), fun hn => ?_⟩ rw [toReal_neg_iff_sign_neg.1 h] at hn exact False.elim (hn.not_lt (by decide)) · simp [h, sign, ← sin_toReal] · refine ⟨fun _ => ?_, fun _ => h.le⟩ rw [sign, ← sin_toReal, sign_nonneg_iff] exact sin_nonneg_of_nonneg_of_le_pi h.le (toReal_le_pi θ) #align real.angle.to_real_nonneg_iff_sign_nonneg Real.Angle.toReal_nonneg_iff_sign_nonneg @[simp] theorem sign_toReal {θ : Angle} (h : θ ≠ π) : SignType.sign θ.toReal = θ.sign := by rcases lt_trichotomy θ.toReal 0 with (ht \| ht \| ht) · simp [ht, toReal_neg_iff_sign_neg.1 ht] · simp [sign, ht, ← sin_toReal] · rw [sign, ← sin_toReal, sign_pos ht, sign_pos (sin_pos_of_pos_of_lt_pi ht ((toReal_le_pi θ).lt_of_ne (toReal_eq_pi_iff.not.2 h)))] #align real.angle.sign_to_real Real.Angle.sign_toReal theorem coe_abs_toReal_of_sign_nonneg {θ : Angle} (h : 0 ≤ θ.sign) : ↑\|θ.toReal\| = θ := by rw [abs_eq_self.2 (toReal_nonneg_iff_sign_nonneg.2 h), coe_toReal] #align real.angle.coe_abs_to_real_of_sign_nonneg Real.Angle.coe_abs_toReal_of_sign_nonneg theorem neg_coe_abs_toReal_of_sign_nonpos {θ : Angle} (h : θ.sign ≤ 0) : -↑\|θ.toReal\| = θ := by rw [SignType.nonpos_iff] at h rcases h with (h \| h) · rw [abs_of_neg (toReal_neg_iff_sign_neg.2 h), coe_neg, neg_neg, coe_toReal] · rw [sign_eq_zero_iff] at h rcases h with (rfl \| rfl) <;> simp [abs_of_pos Real.pi_pos] #align real.angle.neg_coe_abs_to_real_of_sign_nonpos Real.Angle.neg_coe_abs_toReal_of_sign_nonpos theorem eq_iff_sign_eq_and_abs_toReal_eq {θ ψ : Angle} : θ = ψ ↔ θ.sign = ψ.sign ∧ \|θ.toReal\| = \|ψ.toReal\| := by refine ⟨?_, fun h => ?_⟩; · rintro rfl exact ⟨rfl, rfl⟩ rcases h with ⟨hs, hr⟩ rw [abs_eq_abs] at hr rcases hr with (hr \| hr) · exact toReal_injective hr · by_cases h : θ = π · rw [h, toReal_pi, ← neg_eq_iff_eq_neg] at hr exact False.elim ((neg_pi_lt_toReal ψ).ne hr) · by_cases h' : ψ = π · rw [h', toReal_pi] at hr exact False.elim ((neg_pi_lt_toReal θ).ne hr.symm) · rw [← sign_toReal h, ← sign_toReal h', hr, Left.sign_neg, SignType.neg_eq_self_iff, _root_.sign_eq_zero_iff, toReal_eq_zero_iff] at hs rw [hs, toReal_zero, neg_zero, toReal_eq_zero_iff] at hr rw [hr, hs] #align real.angle.eq_iff_sign_eq_and_abs_to_real_eq Real.Angle.eq_iff_sign_eq_and_abs_toReal_eq	Mathlib/Analysis/SpecialFunctions/Trigonometric/Angle.lean	966	967	theorem eq_iff_abs_toReal_eq_of_sign_eq {θ ψ : Angle} (h : θ.sign = ψ.sign) : θ = ψ ↔ \|θ.toReal\| = \|ψ.toReal\| := by	simpa [h] using @eq_iff_sign_eq_and_abs_toReal_eq θ ψ
import Mathlib.Analysis.SpecialFunctions.Pow.Real import Mathlib.Data.Int.Log #align_import analysis.special_functions.log.base from "leanprover-community/mathlib"@"f23a09ce6d3f367220dc3cecad6b7eb69eb01690" open Set Filter Function open Topology noncomputable section namespace Real variable {b x y : ℝ} -- @[pp_nodot] -- Porting note: removed noncomputable def logb (b x : ℝ) : ℝ := log x / log b #align real.logb Real.logb theorem log_div_log : log x / log b = logb b x := rfl #align real.log_div_log Real.log_div_log @[simp] theorem logb_zero : logb b 0 = 0 := by simp [logb] #align real.logb_zero Real.logb_zero @[simp]	Mathlib/Analysis/SpecialFunctions/Log/Base.lean	53	53	theorem logb_one : logb b 1 = 0 := by	simp [logb]
import Mathlib.Topology.MetricSpace.HausdorffDistance #align_import topology.metric_space.pi_nat from "leanprover-community/mathlib"@"49b7f94aab3a3bdca1f9f34c5d818afb253b3993" noncomputable section open scoped Classical open Topology Filter open TopologicalSpace Set Metric Filter Function attribute [local simp] pow_le_pow_iff_right one_lt_two inv_le_inv zero_le_two zero_lt_two variable {E : ℕ → Type} namespace PiNat irreducible_def firstDiff (x y : ∀ n, E n) : ℕ := if h : x ≠ y then Nat.find (ne_iff.1 h) else 0 #align pi_nat.first_diff PiNat.firstDiff theorem apply_firstDiff_ne {x y : ∀ n, E n} (h : x ≠ y) : x (firstDiff x y) ≠ y (firstDiff x y) := by rw [firstDiff_def, dif_pos h] exact Nat.find_spec (ne_iff.1 h) #align pi_nat.apply_first_diff_ne PiNat.apply_firstDiff_ne theorem apply_eq_of_lt_firstDiff {x y : ∀ n, E n} {n : ℕ} (hn : n < firstDiff x y) : x n = y n := by rw [firstDiff_def] at hn split_ifs at hn with h · convert Nat.find_min (ne_iff.1 h) hn simp · exact (not_lt_zero' hn).elim #align pi_nat.apply_eq_of_lt_first_diff PiNat.apply_eq_of_lt_firstDiff theorem firstDiff_comm (x y : ∀ n, E n) : firstDiff x y = firstDiff y x := by simp only [firstDiff_def, ne_comm] #align pi_nat.first_diff_comm PiNat.firstDiff_comm theorem min_firstDiff_le (x y z : ∀ n, E n) (h : x ≠ z) : min (firstDiff x y) (firstDiff y z) ≤ firstDiff x z := by by_contra! H rw [lt_min_iff] at H refine apply_firstDiff_ne h ?_ calc x (firstDiff x z) = y (firstDiff x z) := apply_eq_of_lt_firstDiff H.1 _ = z (firstDiff x z) := apply_eq_of_lt_firstDiff H.2 #align pi_nat.min_first_diff_le PiNat.min_firstDiff_le def cylinder (x : ∀ n, E n) (n : ℕ) : Set (∀ n, E n) := { y \| ∀ i, i < n → y i = x i } #align pi_nat.cylinder PiNat.cylinder theorem cylinder_eq_pi (x : ∀ n, E n) (n : ℕ) : cylinder x n = Set.pi (Finset.range n : Set ℕ) fun i : ℕ => {x i} := by ext y simp [cylinder] #align pi_nat.cylinder_eq_pi PiNat.cylinder_eq_pi @[simp] theorem cylinder_zero (x : ∀ n, E n) : cylinder x 0 = univ := by simp [cylinder_eq_pi] #align pi_nat.cylinder_zero PiNat.cylinder_zero theorem cylinder_anti (x : ∀ n, E n) {m n : ℕ} (h : m ≤ n) : cylinder x n ⊆ cylinder x m := fun _y hy i hi => hy i (hi.trans_le h) #align pi_nat.cylinder_anti PiNat.cylinder_anti @[simp] theorem mem_cylinder_iff {x y : ∀ n, E n} {n : ℕ} : y ∈ cylinder x n ↔ ∀ i < n, y i = x i := Iff.rfl #align pi_nat.mem_cylinder_iff PiNat.mem_cylinder_iff theorem self_mem_cylinder (x : ∀ n, E n) (n : ℕ) : x ∈ cylinder x n := by simp #align pi_nat.self_mem_cylinder PiNat.self_mem_cylinder theorem mem_cylinder_iff_eq {x y : ∀ n, E n} {n : ℕ} : y ∈ cylinder x n ↔ cylinder y n = cylinder x n := by constructor · intro hy apply Subset.antisymm · intro z hz i hi rw [← hy i hi] exact hz i hi · intro z hz i hi rw [hy i hi] exact hz i hi · intro h rw [← h] exact self_mem_cylinder _ _ #align pi_nat.mem_cylinder_iff_eq PiNat.mem_cylinder_iff_eq theorem mem_cylinder_comm (x y : ∀ n, E n) (n : ℕ) : y ∈ cylinder x n ↔ x ∈ cylinder y n := by simp [mem_cylinder_iff_eq, eq_comm] #align pi_nat.mem_cylinder_comm PiNat.mem_cylinder_comm theorem mem_cylinder_iff_le_firstDiff {x y : ∀ n, E n} (hne : x ≠ y) (i : ℕ) : x ∈ cylinder y i ↔ i ≤ firstDiff x y := by constructor · intro h by_contra! exact apply_firstDiff_ne hne (h _ this) · intro hi j hj exact apply_eq_of_lt_firstDiff (hj.trans_le hi) #align pi_nat.mem_cylinder_iff_le_first_diff PiNat.mem_cylinder_iff_le_firstDiff theorem mem_cylinder_firstDiff (x y : ∀ n, E n) : x ∈ cylinder y (firstDiff x y) := fun _i hi => apply_eq_of_lt_firstDiff hi #align pi_nat.mem_cylinder_first_diff PiNat.mem_cylinder_firstDiff theorem cylinder_eq_cylinder_of_le_firstDiff (x y : ∀ n, E n) {n : ℕ} (hn : n ≤ firstDiff x y) : cylinder x n = cylinder y n := by rw [← mem_cylinder_iff_eq] intro i hi exact apply_eq_of_lt_firstDiff (hi.trans_le hn) #align pi_nat.cylinder_eq_cylinder_of_le_first_diff PiNat.cylinder_eq_cylinder_of_le_firstDiff theorem iUnion_cylinder_update (x : ∀ n, E n) (n : ℕ) : ⋃ k, cylinder (update x n k) (n + 1) = cylinder x n := by ext y simp only [mem_cylinder_iff, mem_iUnion] constructor · rintro ⟨k, hk⟩ i hi simpa [hi.ne] using hk i (Nat.lt_succ_of_lt hi) · intro H refine ⟨y n, fun i hi => ?_⟩ rcases Nat.lt_succ_iff_lt_or_eq.1 hi with (h'i \| rfl) · simp [H i h'i, h'i.ne] · simp #align pi_nat.Union_cylinder_update PiNat.iUnion_cylinder_update theorem update_mem_cylinder (x : ∀ n, E n) (n : ℕ) (y : E n) : update x n y ∈ cylinder x n := mem_cylinder_iff.2 fun i hi => by simp [hi.ne] #align pi_nat.update_mem_cylinder PiNat.update_mem_cylinder protected def dist : Dist (∀ n, E n) := ⟨fun x y => if x ≠ y then (1 / 2 : ℝ) ^ firstDiff x y else 0⟩ #align pi_nat.has_dist PiNat.dist attribute [local instance] PiNat.dist theorem dist_eq_of_ne {x y : ∀ n, E n} (h : x ≠ y) : dist x y = (1 / 2 : ℝ) ^ firstDiff x y := by simp [dist, h] #align pi_nat.dist_eq_of_ne PiNat.dist_eq_of_ne protected theorem dist_self (x : ∀ n, E n) : dist x x = 0 := by simp [dist] #align pi_nat.dist_self PiNat.dist_self protected theorem dist_comm (x y : ∀ n, E n) : dist x y = dist y x := by simp [dist, @eq_comm _ x y, firstDiff_comm] #align pi_nat.dist_comm PiNat.dist_comm protected theorem dist_nonneg (x y : ∀ n, E n) : 0 ≤ dist x y := by rcases eq_or_ne x y with (rfl \| h) · simp [dist] · simp [dist, h, zero_le_two] #align pi_nat.dist_nonneg PiNat.dist_nonneg theorem dist_triangle_nonarch (x y z : ∀ n, E n) : dist x z ≤ max (dist x y) (dist y z) := by rcases eq_or_ne x z with (rfl \| hxz) · simp [PiNat.dist_self x, PiNat.dist_nonneg] rcases eq_or_ne x y with (rfl \| hxy) · simp rcases eq_or_ne y z with (rfl \| hyz) · simp simp only [dist_eq_of_ne, hxz, hxy, hyz, inv_le_inv, one_div, inv_pow, zero_lt_two, Ne, not_false_iff, le_max_iff, pow_le_pow_iff_right, one_lt_two, pow_pos, min_le_iff.1 (min_firstDiff_le x y z hxz)] #align pi_nat.dist_triangle_nonarch PiNat.dist_triangle_nonarch protected theorem dist_triangle (x y z : ∀ n, E n) : dist x z ≤ dist x y + dist y z := calc dist x z ≤ max (dist x y) (dist y z) := dist_triangle_nonarch x y z _ ≤ dist x y + dist y z := max_le_add_of_nonneg (PiNat.dist_nonneg _ _) (PiNat.dist_nonneg _ _) #align pi_nat.dist_triangle PiNat.dist_triangle protected theorem eq_of_dist_eq_zero (x y : ∀ n, E n) (hxy : dist x y = 0) : x = y := by rcases eq_or_ne x y with (rfl \| h); · rfl simp [dist_eq_of_ne h] at hxy #align pi_nat.eq_of_dist_eq_zero PiNat.eq_of_dist_eq_zero theorem mem_cylinder_iff_dist_le {x y : ∀ n, E n} {n : ℕ} : y ∈ cylinder x n ↔ dist y x ≤ (1 / 2) ^ n := by rcases eq_or_ne y x with (rfl \| hne) · simp [PiNat.dist_self] suffices (∀ i : ℕ, i < n → y i = x i) ↔ n ≤ firstDiff y x by simpa [dist_eq_of_ne hne] constructor · intro hy by_contra! H exact apply_firstDiff_ne hne (hy _ H) · intro h i hi exact apply_eq_of_lt_firstDiff (hi.trans_le h) #align pi_nat.mem_cylinder_iff_dist_le PiNat.mem_cylinder_iff_dist_le theorem apply_eq_of_dist_lt {x y : ∀ n, E n} {n : ℕ} (h : dist x y < (1 / 2) ^ n) {i : ℕ} (hi : i ≤ n) : x i = y i := by rcases eq_or_ne x y with (rfl \| hne) · rfl have : n < firstDiff x y := by simpa [dist_eq_of_ne hne, inv_lt_inv, pow_lt_pow_iff_right, one_lt_two] using h exact apply_eq_of_lt_firstDiff (hi.trans_lt this) #align pi_nat.apply_eq_of_dist_lt PiNat.apply_eq_of_dist_lt theorem lipschitz_with_one_iff_forall_dist_image_le_of_mem_cylinder {α : Type} [PseudoMetricSpace α] {f : (∀ n, E n) → α} : (∀ x y : ∀ n, E n, dist (f x) (f y) ≤ dist x y) ↔ ∀ x y n, y ∈ cylinder x n → dist (f x) (f y) ≤ (1 / 2) ^ n := by constructor · intro H x y n hxy apply (H x y).trans rw [PiNat.dist_comm] exact mem_cylinder_iff_dist_le.1 hxy · intro H x y rcases eq_or_ne x y with (rfl \| hne) · simp [PiNat.dist_nonneg] rw [dist_eq_of_ne hne] apply H x y (firstDiff x y) rw [firstDiff_comm] exact mem_cylinder_firstDiff _ _ #align pi_nat.lipschitz_with_one_iff_forall_dist_image_le_of_mem_cylinder PiNat.lipschitz_with_one_iff_forall_dist_image_le_of_mem_cylinder variable (E) variable [∀ n, TopologicalSpace (E n)] [∀ n, DiscreteTopology (E n)] theorem isOpen_cylinder (x : ∀ n, E n) (n : ℕ) : IsOpen (cylinder x n) := by rw [PiNat.cylinder_eq_pi] exact isOpen_set_pi (Finset.range n).finite_toSet fun a _ => isOpen_discrete _ #align pi_nat.is_open_cylinder PiNat.isOpen_cylinder theorem isTopologicalBasis_cylinders : IsTopologicalBasis { s : Set (∀ n, E n) \| ∃ (x : ∀ n, E n) (n : ℕ), s = cylinder x n } := by apply isTopologicalBasis_of_isOpen_of_nhds · rintro u ⟨x, n, rfl⟩ apply isOpen_cylinder · intro x u hx u_open obtain ⟨v, ⟨U, F, -, rfl⟩, xU, Uu⟩ : ∃ v ∈ { S : Set (∀ i : ℕ, E i) \| ∃ (U : ∀ i : ℕ, Set (E i)) (F : Finset ℕ), (∀ i : ℕ, i ∈ F → U i ∈ { s : Set (E i) \| IsOpen s }) ∧ S = (F : Set ℕ).pi U }, x ∈ v ∧ v ⊆ u := (isTopologicalBasis_pi fun n : ℕ => isTopologicalBasis_opens).exists_subset_of_mem_open hx u_open rcases Finset.bddAbove F with ⟨n, hn⟩ refine ⟨cylinder x (n + 1), ⟨x, n + 1, rfl⟩, self_mem_cylinder _ _, Subset.trans ?_ Uu⟩ intro y hy suffices ∀ i : ℕ, i ∈ F → y i ∈ U i by simpa intro i hi have : y i = x i := mem_cylinder_iff.1 hy i ((hn hi).trans_lt (lt_add_one n)) rw [this] simp only [Set.mem_pi, Finset.mem_coe] at xU exact xU i hi #align pi_nat.is_topological_basis_cylinders PiNat.isTopologicalBasis_cylinders variable {E} theorem isOpen_iff_dist (s : Set (∀ n, E n)) : IsOpen s ↔ ∀ x ∈ s, ∃ ε > 0, ∀ y, dist x y < ε → y ∈ s := by constructor · intro hs x hx obtain ⟨v, ⟨y, n, rfl⟩, h'x, h's⟩ : ∃ v ∈ { s \| ∃ (x : ∀ n : ℕ, E n) (n : ℕ), s = cylinder x n }, x ∈ v ∧ v ⊆ s := (isTopologicalBasis_cylinders E).exists_subset_of_mem_open hx hs rw [← mem_cylinder_iff_eq.1 h'x] at h's exact ⟨(1 / 2 : ℝ) ^ n, by simp, fun y hy => h's fun i hi => (apply_eq_of_dist_lt hy hi.le).symm⟩ · intro h refine (isTopologicalBasis_cylinders E).isOpen_iff.2 fun x hx => ?_ rcases h x hx with ⟨ε, εpos, hε⟩ obtain ⟨n, hn⟩ : ∃ n : ℕ, (1 / 2 : ℝ) ^ n < ε := exists_pow_lt_of_lt_one εpos one_half_lt_one refine ⟨cylinder x n, ⟨x, n, rfl⟩, self_mem_cylinder x n, fun y hy => hε y ?_⟩ rw [PiNat.dist_comm] exact (mem_cylinder_iff_dist_le.1 hy).trans_lt hn #align pi_nat.is_open_iff_dist PiNat.isOpen_iff_dist protected def metricSpace : MetricSpace (∀ n, E n) := MetricSpace.ofDistTopology dist PiNat.dist_self PiNat.dist_comm PiNat.dist_triangle isOpen_iff_dist PiNat.eq_of_dist_eq_zero #align pi_nat.metric_space PiNat.metricSpace protected def metricSpaceOfDiscreteUniformity {E : ℕ → Type} [∀ n, UniformSpace (E n)] (h : ∀ n, uniformity (E n) = 𝓟 idRel) : MetricSpace (∀ n, E n) := haveI : ∀ n, DiscreteTopology (E n) := fun n => discreteTopology_of_discrete_uniformity (h n) { dist_triangle := PiNat.dist_triangle dist_comm := PiNat.dist_comm dist_self := PiNat.dist_self eq_of_dist_eq_zero := PiNat.eq_of_dist_eq_zero _ _ edist_dist := fun _ _ ↦ by exact ENNReal.coe_nnreal_eq _ toUniformSpace := Pi.uniformSpace _ uniformity_dist := by simp [Pi.uniformity, comap_iInf, gt_iff_lt, preimage_setOf_eq, comap_principal, PseudoMetricSpace.uniformity_dist, h, idRel] apply le_antisymm · simp only [le_iInf_iff, le_principal_iff] intro ε εpos obtain ⟨n, hn⟩ : ∃ n, (1 / 2 : ℝ) ^ n < ε := exists_pow_lt_of_lt_one εpos (by norm_num) apply @mem_iInf_of_iInter _ _ _ _ _ (Finset.range n).finite_toSet fun i => { p : (∀ n : ℕ, E n) × ∀ n : ℕ, E n \| p.fst i = p.snd i } · simp only [mem_principal, setOf_subset_setOf, imp_self, imp_true_iff] · rintro ⟨x, y⟩ hxy simp only [Finset.mem_coe, Finset.mem_range, iInter_coe_set, mem_iInter, mem_setOf_eq] at hxy apply lt_of_le_of_lt _ hn rw [← mem_cylinder_iff_dist_le, mem_cylinder_iff] exact hxy · simp only [le_iInf_iff, le_principal_iff] intro n refine mem_iInf_of_mem ((1 / 2) ^ n : ℝ) ?_ refine mem_iInf_of_mem (by positivity) ?_ simp only [mem_principal, setOf_subset_setOf, Prod.forall] intro x y hxy exact apply_eq_of_dist_lt hxy le_rfl } #align pi_nat.metric_space_of_discrete_uniformity PiNat.metricSpaceOfDiscreteUniformity def metricSpaceNatNat : MetricSpace (ℕ → ℕ) := PiNat.metricSpaceOfDiscreteUniformity fun _ => rfl #align pi_nat.metric_space_nat_nat PiNat.metricSpaceNatNat attribute [local instance] PiNat.metricSpace protected theorem completeSpace : CompleteSpace (∀ n, E n) := by refine Metric.complete_of_convergent_controlled_sequences (fun n => (1 / 2) ^ n) (by simp) ?_ intro u hu refine ⟨fun n => u n n, tendsto_pi_nhds.2 fun i => ?_⟩ refine tendsto_const_nhds.congr' ?_ filter_upwards [Filter.Ici_mem_atTop i] with n hn exact apply_eq_of_dist_lt (hu i i n le_rfl hn) le_rfl #align pi_nat.complete_space PiNat.completeSpace theorem exists_disjoint_cylinder {s : Set (∀ n, E n)} (hs : IsClosed s) {x : ∀ n, E n} (hx : x ∉ s) : ∃ n, Disjoint s (cylinder x n) := by rcases eq_empty_or_nonempty s with (rfl \| hne) · exact ⟨0, by simp⟩ have A : 0 < infDist x s := (hs.not_mem_iff_infDist_pos hne).1 hx obtain ⟨n, hn⟩ : ∃ n, (1 / 2 : ℝ) ^ n < infDist x s := exists_pow_lt_of_lt_one A one_half_lt_one refine ⟨n, disjoint_left.2 fun y ys hy => ?_⟩ apply lt_irrefl (infDist x s) calc infDist x s ≤ dist x y := infDist_le_dist_of_mem ys _ ≤ (1 / 2) ^ n := by rw [mem_cylinder_comm] at hy exact mem_cylinder_iff_dist_le.1 hy _ < infDist x s := hn #align pi_nat.exists_disjoint_cylinder PiNat.exists_disjoint_cylinder def shortestPrefixDiff {E : ℕ → Type} (x : ∀ n, E n) (s : Set (∀ n, E n)) : ℕ := if h : ∃ n, Disjoint s (cylinder x n) then Nat.find h else 0 #align pi_nat.shortest_prefix_diff PiNat.shortestPrefixDiff theorem firstDiff_lt_shortestPrefixDiff {s : Set (∀ n, E n)} (hs : IsClosed s) {x y : ∀ n, E n} (hx : x ∉ s) (hy : y ∈ s) : firstDiff x y < shortestPrefixDiff x s := by have A := exists_disjoint_cylinder hs hx rw [shortestPrefixDiff, dif_pos A] have B := Nat.find_spec A contrapose! B rw [not_disjoint_iff_nonempty_inter] refine ⟨y, hy, ?_⟩ rw [mem_cylinder_comm] exact cylinder_anti y B (mem_cylinder_firstDiff x y) #align pi_nat.first_diff_lt_shortest_prefix_diff PiNat.firstDiff_lt_shortestPrefixDiff	Mathlib/Topology/MetricSpace/PiNat.lean	522	525	theorem shortestPrefixDiff_pos {s : Set (∀ n, E n)} (hs : IsClosed s) (hne : s.Nonempty) {x : ∀ n, E n} (hx : x ∉ s) : 0 < shortestPrefixDiff x s := by	rcases hne with ⟨y, hy⟩ exact (zero_le _).trans_lt (firstDiff_lt_shortestPrefixDiff hs hx hy)
import Mathlib.Data.Fintype.Basic import Mathlib.ModelTheory.Substructures #align_import model_theory.elementary_maps from "leanprover-community/mathlib"@"d11893b411025250c8e61ff2f12ccbd7ee35ab15" open FirstOrder namespace FirstOrder namespace Language open Structure variable (L : Language) (M : Type) (N : Type) {P : Type} {Q : Type} variable [L.Structure M] [L.Structure N] [L.Structure P] [L.Structure Q] structure ElementaryEmbedding 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_formula' : ∀ ⦃n⦄ (φ : L.Formula (Fin n)) (x : Fin n → M), φ.Realize (toFun ∘ x) ↔ φ.Realize x := by intros; trivial #align first_order.language.elementary_embedding FirstOrder.Language.ElementaryEmbedding #align first_order.language.elementary_embedding.to_fun FirstOrder.Language.ElementaryEmbedding.toFun #align first_order.language.elementary_embedding.map_formula' FirstOrder.Language.ElementaryEmbedding.map_formula' @[inherit_doc FirstOrder.Language.ElementaryEmbedding] scoped[FirstOrder] notation:25 A " ↪ₑ[" L "] " B => FirstOrder.Language.ElementaryEmbedding L A B variable {L} {M} {N} namespace ElementaryEmbedding attribute [coe] toFun instance instFunLike : FunLike (M ↪ₑ[L] N) M N where coe f := f.toFun coe_injective' f g h := by cases f cases g simp only [ElementaryEmbedding.mk.injEq] ext x exact Function.funext_iff.1 h x #align first_order.language.elementary_embedding.fun_like FirstOrder.Language.ElementaryEmbedding.instFunLike instance : CoeFun (M ↪ₑ[L] N) fun _ => M → N := DFunLike.hasCoeToFun @[simp] theorem map_boundedFormula (f : M ↪ₑ[L] N) {α : Type} {n : ℕ} (φ : L.BoundedFormula α n) (v : α → M) (xs : Fin n → M) : φ.Realize (f ∘ v) (f ∘ xs) ↔ φ.Realize v xs := by classical rw [← BoundedFormula.realize_restrictFreeVar Set.Subset.rfl, Set.inclusion_eq_id, iff_eq_eq] have h := f.map_formula' ((φ.restrictFreeVar id).toFormula.relabel (Fintype.equivFin _)) (Sum.elim (v ∘ (↑)) xs ∘ (Fintype.equivFin _).symm) simp only [Formula.realize_relabel, BoundedFormula.realize_toFormula, iff_eq_eq] at h rw [← Function.comp.assoc _ _ (Fintype.equivFin _).symm, Function.comp.assoc _ (Fintype.equivFin _).symm (Fintype.equivFin _), _root_.Equiv.symm_comp_self, Function.comp_id, Function.comp.assoc, Sum.elim_comp_inl, Function.comp.assoc _ _ Sum.inr, Sum.elim_comp_inr, ← Function.comp.assoc] at h refine h.trans ?_ erw [Function.comp.assoc _ _ (Fintype.equivFin _), _root_.Equiv.symm_comp_self, Function.comp_id, Sum.elim_comp_inl, Sum.elim_comp_inr (v ∘ Subtype.val) xs, ← Set.inclusion_eq_id (s := (BoundedFormula.freeVarFinset φ : Set α)) Set.Subset.rfl, BoundedFormula.realize_restrictFreeVar Set.Subset.rfl] #align first_order.language.elementary_embedding.map_bounded_formula FirstOrder.Language.ElementaryEmbedding.map_boundedFormula @[simp] theorem map_formula (f : M ↪ₑ[L] N) {α : Type} (φ : L.Formula α) (x : α → M) : φ.Realize (f ∘ x) ↔ φ.Realize x := by rw [Formula.Realize, Formula.Realize, ← f.map_boundedFormula, Unique.eq_default (f ∘ default)] #align first_order.language.elementary_embedding.map_formula FirstOrder.Language.ElementaryEmbedding.map_formula	Mathlib/ModelTheory/ElementaryMaps.lean	103	104	theorem map_sentence (f : M ↪ₑ[L] N) (φ : L.Sentence) : M ⊨ φ ↔ N ⊨ φ := by	rw [Sentence.Realize, Sentence.Realize, ← f.map_formula, Unique.eq_default (f ∘ default)]
import Mathlib.Algebra.Algebra.RestrictScalars import Mathlib.Algebra.Algebra.Subalgebra.Basic import Mathlib.LinearAlgebra.Quotient import Mathlib.LinearAlgebra.StdBasis import Mathlib.GroupTheory.Finiteness import Mathlib.RingTheory.Ideal.Maps import Mathlib.RingTheory.Nilpotent.Defs #align_import ring_theory.finiteness from "leanprover-community/mathlib"@"c813ed7de0f5115f956239124e9b30f3a621966f" open Function (Surjective) namespace Submodule variable {R : Type} {M : Type} [Semiring R] [AddCommMonoid M] [Module R M] open Set def FG (N : Submodule R M) : Prop := ∃ S : Finset M, Submodule.span R ↑S = N #align submodule.fg Submodule.FG theorem fg_def {N : Submodule R M} : N.FG ↔ ∃ S : Set M, S.Finite ∧ span R S = N := ⟨fun ⟨t, h⟩ => ⟨_, Finset.finite_toSet t, h⟩, by rintro ⟨t', h, rfl⟩ rcases Finite.exists_finset_coe h with ⟨t, rfl⟩ exact ⟨t, rfl⟩⟩ #align submodule.fg_def Submodule.fg_def theorem fg_iff_addSubmonoid_fg (P : Submodule ℕ M) : P.FG ↔ P.toAddSubmonoid.FG := ⟨fun ⟨S, hS⟩ => ⟨S, by simpa [← span_nat_eq_addSubmonoid_closure] using hS⟩, fun ⟨S, hS⟩ => ⟨S, by simpa [← span_nat_eq_addSubmonoid_closure] using hS⟩⟩ #align submodule.fg_iff_add_submonoid_fg Submodule.fg_iff_addSubmonoid_fg theorem fg_iff_add_subgroup_fg {G : Type} [AddCommGroup G] (P : Submodule ℤ G) : P.FG ↔ P.toAddSubgroup.FG := ⟨fun ⟨S, hS⟩ => ⟨S, by simpa [← span_int_eq_addSubgroup_closure] using hS⟩, fun ⟨S, hS⟩ => ⟨S, by simpa [← span_int_eq_addSubgroup_closure] using hS⟩⟩ #align submodule.fg_iff_add_subgroup_fg Submodule.fg_iff_add_subgroup_fg theorem fg_iff_exists_fin_generating_family {N : Submodule R M} : N.FG ↔ ∃ (n : ℕ) (s : Fin n → M), span R (range s) = N := by rw [fg_def] constructor · rintro ⟨S, Sfin, hS⟩ obtain ⟨n, f, rfl⟩ := Sfin.fin_embedding exact ⟨n, f, hS⟩ · rintro ⟨n, s, hs⟩ exact ⟨range s, finite_range s, hs⟩ #align submodule.fg_iff_exists_fin_generating_family Submodule.fg_iff_exists_fin_generating_family theorem exists_sub_one_mem_and_smul_eq_zero_of_fg_of_le_smul {R : Type} [CommRing R] {M : Type} [AddCommGroup M] [Module R M] (I : Ideal R) (N : Submodule R M) (hn : N.FG) (hin : N ≤ I • N) : ∃ r : R, r - 1 ∈ I ∧ ∀ n ∈ N, r • n = (0 : M) := by rw [fg_def] at hn rcases hn with ⟨s, hfs, hs⟩ have : ∃ r : R, r - 1 ∈ I ∧ N ≤ (I • span R s).comap (LinearMap.lsmul R M r) ∧ s ⊆ N := by refine ⟨1, ?_, ?_, ?_⟩ · rw [sub_self] exact I.zero_mem · rw [hs] intro n hn rw [mem_comap] change (1 : R) • n ∈ I • N rw [one_smul] exact hin hn · rw [← span_le, hs] clear hin hs revert this refine Set.Finite.dinduction_on _ hfs (fun H => ?_) @fun i s _ _ ih H => ?_ · rcases H with ⟨r, hr1, hrn, _⟩ refine ⟨r, hr1, fun n hn => ?_⟩ specialize hrn hn rwa [mem_comap, span_empty, smul_bot, mem_bot] at hrn apply ih rcases H with ⟨r, hr1, hrn, hs⟩ rw [← Set.singleton_union, span_union, smul_sup] at hrn rw [Set.insert_subset_iff] at hs have : ∃ c : R, c - 1 ∈ I ∧ c • i ∈ I • span R s := by specialize hrn hs.1 rw [mem_comap, mem_sup] at hrn rcases hrn with ⟨y, hy, z, hz, hyz⟩ dsimp at hyz rw [mem_smul_span_singleton] at hy rcases hy with ⟨c, hci, rfl⟩ use r - c constructor · rw [sub_right_comm] exact I.sub_mem hr1 hci · rw [sub_smul, ← hyz, add_sub_cancel_left] exact hz rcases this with ⟨c, hc1, hci⟩ refine ⟨c r, ?_, ?_, hs.2⟩ · simpa only [mul_sub, mul_one, sub_add_sub_cancel] using I.add_mem (I.mul_mem_left c hr1) hc1 · intro n hn specialize hrn hn rw [mem_comap, mem_sup] at hrn rcases hrn with ⟨y, hy, z, hz, hyz⟩ dsimp at hyz rw [mem_smul_span_singleton] at hy rcases hy with ⟨d, _, rfl⟩ simp only [mem_comap, LinearMap.lsmul_apply] rw [mul_smul, ← hyz, smul_add, smul_smul, mul_comm, mul_smul] exact add_mem (smul_mem _ _ hci) (smul_mem _ _ hz) #align submodule.exists_sub_one_mem_and_smul_eq_zero_of_fg_of_le_smul Submodule.exists_sub_one_mem_and_smul_eq_zero_of_fg_of_le_smul theorem exists_mem_and_smul_eq_self_of_fg_of_le_smul {R : Type} [CommRing R] {M : Type} [AddCommGroup M] [Module R M] (I : Ideal R) (N : Submodule R M) (hn : N.FG) (hin : N ≤ I • N) : ∃ r ∈ I, ∀ n ∈ N, r • n = n := by obtain ⟨r, hr, hr'⟩ := exists_sub_one_mem_and_smul_eq_zero_of_fg_of_le_smul I N hn hin exact ⟨-(r - 1), I.neg_mem hr, fun n hn => by simpa [sub_smul] using hr' n hn⟩ #align submodule.exists_mem_and_smul_eq_self_of_fg_of_le_smul Submodule.exists_mem_and_smul_eq_self_of_fg_of_le_smul theorem fg_bot : (⊥ : Submodule R M).FG := ⟨∅, by rw [Finset.coe_empty, span_empty]⟩ #align submodule.fg_bot Submodule.fg_bot theorem _root_.Subalgebra.fg_bot_toSubmodule {R A : Type} [CommSemiring R] [Semiring A] [Algebra R A] : (⊥ : Subalgebra R A).toSubmodule.FG := ⟨{1}, by simp [Algebra.toSubmodule_bot, one_eq_span]⟩ #align subalgebra.fg_bot_to_submodule Subalgebra.fg_bot_toSubmodule theorem fg_unit {R A : Type} [CommSemiring R] [Semiring A] [Algebra R A] (I : (Submodule R A)ˣ) : (I : Submodule R A).FG := by have : (1 : A) ∈ (I * ↑I⁻¹ : Submodule R A) := by rw [I.mul_inv] exact one_le.mp le_rfl obtain ⟨T, T', hT, hT', one_mem⟩ := mem_span_mul_finite_of_mem_mul this refine ⟨T, span_eq_of_le _ hT ?_⟩ rw [← one_mul I, ← mul_one (span R (T : Set A))] conv_rhs => rw [← I.inv_mul, ← mul_assoc] refine mul_le_mul_left (le_trans ?_ <\| mul_le_mul_right <\| span_le.mpr hT') simp only [Units.val_one, span_mul_span] rwa [one_le] #align submodule.fg_unit Submodule.fg_unit theorem fg_of_isUnit {R A : Type} [CommSemiring R] [Semiring A] [Algebra R A] {I : Submodule R A} (hI : IsUnit I) : I.FG := fg_unit hI.unit #align submodule.fg_of_is_unit Submodule.fg_of_isUnit theorem fg_span {s : Set M} (hs : s.Finite) : FG (span R s) := ⟨hs.toFinset, by rw [hs.coe_toFinset]⟩ #align submodule.fg_span Submodule.fg_span theorem fg_span_singleton (x : M) : FG (R ∙ x) := fg_span (finite_singleton x) #align submodule.fg_span_singleton Submodule.fg_span_singleton theorem FG.sup {N₁ N₂ : Submodule R M} (hN₁ : N₁.FG) (hN₂ : N₂.FG) : (N₁ ⊔ N₂).FG := let ⟨t₁, ht₁⟩ := fg_def.1 hN₁ let ⟨t₂, ht₂⟩ := fg_def.1 hN₂ fg_def.2 ⟨t₁ ∪ t₂, ht₁.1.union ht₂.1, by rw [span_union, ht₁.2, ht₂.2]⟩ #align submodule.fg.sup Submodule.FG.sup theorem fg_finset_sup {ι : Type} (s : Finset ι) (N : ι → Submodule R M) (h : ∀ i ∈ s, (N i).FG) : (s.sup N).FG := Finset.sup_induction fg_bot (fun _ ha _ hb => ha.sup hb) h #align submodule.fg_finset_sup Submodule.fg_finset_sup theorem fg_biSup {ι : Type} (s : Finset ι) (N : ι → Submodule R M) (h : ∀ i ∈ s, (N i).FG) : (⨆ i ∈ s, N i).FG := by simpa only [Finset.sup_eq_iSup] using fg_finset_sup s N h #align submodule.fg_bsupr Submodule.fg_biSup theorem fg_iSup {ι : Sort} [Finite ι] (N : ι → Submodule R M) (h : ∀ i, (N i).FG) : (iSup N).FG := by cases nonempty_fintype (PLift ι) simpa [iSup_plift_down] using fg_biSup Finset.univ (N ∘ PLift.down) fun i _ => h i.down #align submodule.fg_supr Submodule.fg_iSup variable {P : Type} [AddCommMonoid P] [Module R P] variable (f : M →ₗ[R] P) theorem FG.map {N : Submodule R M} (hs : N.FG) : (N.map f).FG := let ⟨t, ht⟩ := fg_def.1 hs fg_def.2 ⟨f '' t, ht.1.image _, by rw [span_image, ht.2]⟩ #align submodule.fg.map Submodule.FG.map variable {f} theorem fg_of_fg_map_injective (f : M →ₗ[R] P) (hf : Function.Injective f) {N : Submodule R M} (hfn : (N.map f).FG) : N.FG := let ⟨t, ht⟩ := hfn ⟨t.preimage f fun x _ y _ h => hf h, Submodule.map_injective_of_injective hf <\| by rw [map_span, Finset.coe_preimage, Set.image_preimage_eq_inter_range, Set.inter_eq_self_of_subset_left, ht] rw [← LinearMap.range_coe, ← span_le, ht, ← map_top] exact map_mono le_top⟩ #align submodule.fg_of_fg_map_injective Submodule.fg_of_fg_map_injective theorem fg_of_fg_map {R M P : Type} [Ring R] [AddCommGroup M] [Module R M] [AddCommGroup P] [Module R P] (f : M →ₗ[R] P) (hf : LinearMap.ker f = ⊥) {N : Submodule R M} (hfn : (N.map f).FG) : N.FG := fg_of_fg_map_injective f (LinearMap.ker_eq_bot.1 hf) hfn #align submodule.fg_of_fg_map Submodule.fg_of_fg_map theorem fg_top (N : Submodule R M) : (⊤ : Submodule R N).FG ↔ N.FG := ⟨fun h => N.range_subtype ▸ map_top N.subtype ▸ h.map _, fun h => fg_of_fg_map_injective N.subtype Subtype.val_injective <\| by rwa [map_top, range_subtype]⟩ #align submodule.fg_top Submodule.fg_top theorem fg_of_linearEquiv (e : M ≃ₗ[R] P) (h : (⊤ : Submodule R P).FG) : (⊤ : Submodule R M).FG := e.symm.range ▸ map_top (e.symm : P →ₗ[R] M) ▸ h.map _ #align submodule.fg_of_linear_equiv Submodule.fg_of_linearEquiv theorem FG.prod {sb : Submodule R M} {sc : Submodule R P} (hsb : sb.FG) (hsc : sc.FG) : (sb.prod sc).FG := let ⟨tb, htb⟩ := fg_def.1 hsb let ⟨tc, htc⟩ := fg_def.1 hsc fg_def.2 ⟨LinearMap.inl R M P '' tb ∪ LinearMap.inr R M P '' tc, (htb.1.image _).union (htc.1.image _), by rw [LinearMap.span_inl_union_inr, htb.2, htc.2]⟩ #align submodule.fg.prod Submodule.FG.prod theorem fg_pi {ι : Type} {M : ι → Type} [Finite ι] [∀ i, AddCommMonoid (M i)] [∀ i, Module R (M i)] {p : ∀ i, Submodule R (M i)} (hsb : ∀ i, (p i).FG) : (Submodule.pi Set.univ p).FG := by classical simp_rw [fg_def] at hsb ⊢ choose t htf hts using hsb refine ⟨⋃ i, (LinearMap.single i : _ →ₗ[R] _) '' t i, Set.finite_iUnion fun i => (htf i).image _, ?_⟩ -- Note: #8386 changed `span_image` into `span_image _` simp_rw [span_iUnion, span_image _, hts, Submodule.iSup_map_single] #align submodule.fg_pi Submodule.fg_pi theorem fg_of_fg_map_of_fg_inf_ker {R M P : Type} [Ring R] [AddCommGroup M] [Module R M] [AddCommGroup P] [Module R P] (f : M →ₗ[R] P) {s : Submodule R M} (hs1 : (s.map f).FG) (hs2 : (s ⊓ LinearMap.ker f).FG) : s.FG := by haveI := Classical.decEq R haveI := Classical.decEq M haveI := Classical.decEq P cases' hs1 with t1 ht1 cases' hs2 with t2 ht2 have : ∀ y ∈ t1, ∃ x ∈ s, f x = y := by intro y hy have : y ∈ s.map f := by rw [← ht1] exact subset_span hy rcases mem_map.1 this with ⟨x, hx1, hx2⟩ exact ⟨x, hx1, hx2⟩ have : ∃ g : P → M, ∀ y ∈ t1, g y ∈ s ∧ f (g y) = y := by choose g hg1 hg2 using this exists fun y => if H : y ∈ t1 then g y H else 0 intro y H constructor · simp only [dif_pos H] apply hg1 · simp only [dif_pos H] apply hg2 cases' this with g hg clear this exists t1.image g ∪ t2 rw [Finset.coe_union, span_union, Finset.coe_image] apply le_antisymm · refine sup_le (span_le.2 <\| image_subset_iff.2 ?_) (span_le.2 ?_) · intro y hy exact (hg y hy).1 · intro x hx have : x ∈ span R t2 := subset_span hx rw [ht2] at this exact this.1 intro x hx have : f x ∈ s.map f := by rw [mem_map] exact ⟨x, hx, rfl⟩ rw [← ht1, ← Set.image_id (t1 : Set P), Finsupp.mem_span_image_iff_total] at this rcases this with ⟨l, hl1, hl2⟩ refine mem_sup.2 ⟨(Finsupp.total M M R id).toFun ((Finsupp.lmapDomain R R g : (P →₀ R) → M →₀ R) l), ?_, x - Finsupp.total M M R id ((Finsupp.lmapDomain R R g : (P →₀ R) → M →₀ R) l), ?_, add_sub_cancel _ _⟩ · rw [← Set.image_id (g '' ↑t1), Finsupp.mem_span_image_iff_total] refine ⟨_, ?_, rfl⟩ haveI : Inhabited P := ⟨0⟩ rw [← Finsupp.lmapDomain_supported _ _ g, mem_map] refine ⟨l, hl1, ?_⟩ rfl rw [ht2, mem_inf] constructor · apply s.sub_mem hx rw [Finsupp.total_apply, Finsupp.lmapDomain_apply, Finsupp.sum_mapDomain_index] · refine s.sum_mem ?_ intro y hy exact s.smul_mem _ (hg y (hl1 hy)).1 · exact zero_smul _ · exact fun _ _ _ => add_smul _ _ _ · rw [LinearMap.mem_ker, f.map_sub, ← hl2] rw [Finsupp.total_apply, Finsupp.total_apply, Finsupp.lmapDomain_apply] rw [Finsupp.sum_mapDomain_index, Finsupp.sum, Finsupp.sum, map_sum] · rw [sub_eq_zero] refine Finset.sum_congr rfl fun y hy => ?_ unfold id rw [f.map_smul, (hg y (hl1 hy)).2] · exact zero_smul _ · exact fun _ _ _ => add_smul _ _ _ #align submodule.fg_of_fg_map_of_fg_inf_ker Submodule.fg_of_fg_map_of_fg_inf_ker theorem fg_induction (R M : Type) [Semiring R] [AddCommMonoid M] [Module R M] (P : Submodule R M → Prop) (h₁ : ∀ x, P (Submodule.span R {x})) (h₂ : ∀ M₁ M₂, P M₁ → P M₂ → P (M₁ ⊔ M₂)) (N : Submodule R M) (hN : N.FG) : P N := by classical obtain ⟨s, rfl⟩ := hN induction s using Finset.induction · rw [Finset.coe_empty, Submodule.span_empty, ← Submodule.span_zero_singleton] apply h₁ · rw [Finset.coe_insert, Submodule.span_insert] apply h₂ <;> apply_assumption #align submodule.fg_induction Submodule.fg_induction theorem fg_ker_comp {R M N P : Type} [Ring R] [AddCommGroup M] [Module R M] [AddCommGroup N] [Module R N] [AddCommGroup P] [Module R P] (f : M →ₗ[R] N) (g : N →ₗ[R] P) (hf1 : (LinearMap.ker f).FG) (hf2 : (LinearMap.ker g).FG) (hsur : Function.Surjective f) : (g.comp f).ker.FG := by rw [LinearMap.ker_comp] apply fg_of_fg_map_of_fg_inf_ker f · rwa [Submodule.map_comap_eq, LinearMap.range_eq_top.2 hsur, top_inf_eq] · rwa [inf_of_le_right (show (LinearMap.ker f) ≤ (LinearMap.ker g).comap f from comap_mono bot_le)] #align submodule.fg_ker_comp Submodule.fg_ker_comp theorem fg_restrictScalars {R S M : Type} [CommSemiring R] [Semiring S] [Algebra R S] [AddCommGroup M] [Module S M] [Module R M] [IsScalarTower R S M] (N : Submodule S M) (hfin : N.FG) (h : Function.Surjective (algebraMap R S)) : (Submodule.restrictScalars R N).FG := by obtain ⟨X, rfl⟩ := hfin use X exact (Submodule.restrictScalars_span R S h (X : Set M)).symm #align submodule.fg_restrict_scalars Submodule.fg_restrictScalars theorem FG.stabilizes_of_iSup_eq {M' : Submodule R M} (hM' : M'.FG) (N : ℕ →o Submodule R M) (H : iSup N = M') : ∃ n, M' = N n := by obtain ⟨S, hS⟩ := hM' have : ∀ s : S, ∃ n, (s : M) ∈ N n := fun s => (Submodule.mem_iSup_of_chain N s).mp (by rw [H, ← hS] exact Submodule.subset_span s.2) choose f hf using this use S.attach.sup f apply le_antisymm · conv_lhs => rw [← hS] rw [Submodule.span_le] intro s hs exact N.2 (Finset.le_sup <\| S.mem_attach ⟨s, hs⟩) (hf _) · rw [← H] exact le_iSup _ _ #align submodule.fg.stablizes_of_supr_eq Submodule.FG.stabilizes_of_iSup_eq	Mathlib/RingTheory/Finiteness.lean	389	415	theorem fg_iff_compact (s : Submodule R M) : s.FG ↔ CompleteLattice.IsCompactElement s := by	classical -- Introduce shorthand for span of an element let sp : M → Submodule R M := fun a => span R {a} -- Trivial rewrite lemma; a small hack since simp (only) & rw can't accomplish this smoothly. have supr_rw : ∀ t : Finset M, ⨆ x ∈ t, sp x = ⨆ x ∈ (↑t : Set M), sp x := fun t => by rfl constructor · rintro ⟨t, rfl⟩ rw [span_eq_iSup_of_singleton_spans, ← supr_rw, ← Finset.sup_eq_iSup t sp] apply CompleteLattice.isCompactElement_finsetSup exact fun n _ => singleton_span_isCompactElement n · intro h -- s is the Sup of the spans of its elements. have sSup' : s = sSup (sp '' ↑s) := by rw [sSup_eq_iSup, iSup_image, ← span_eq_iSup_of_singleton_spans, eq_comm, span_eq] -- by h, s is then below (and equal to) the sup of the spans of finitely many elements. obtain ⟨u, ⟨huspan, husup⟩⟩ := h (sp '' ↑s) (le_of_eq sSup') have ssup : s = u.sup id := by suffices u.sup id ≤ s from le_antisymm husup this rw [sSup', Finset.sup_id_eq_sSup] exact sSup_le_sSup huspan -- Porting note: had to split this out of the `obtain` have := Finset.subset_image_iff.mp huspan obtain ⟨t, ⟨-, rfl⟩⟩ := this rw [Finset.sup_image, Function.id_comp, Finset.sup_eq_iSup, supr_rw, ← span_eq_iSup_of_singleton_spans, eq_comm] at ssup exact ⟨t, ssup⟩
import Mathlib.Data.Finset.Lattice #align_import order.irreducible from "leanprover-community/mathlib"@"bf2428c9486c407ca38b5b3fb10b87dad0bc99fa" open Finset OrderDual variable {ι α : Type*} section SemilatticeSup variable [SemilatticeSup α] {a b c : α} def SupIrred (a : α) : Prop := ¬IsMin a ∧ ∀ ⦃b c⦄, b ⊔ c = a → b = a ∨ c = a #align sup_irred SupIrred def SupPrime (a : α) : Prop := ¬IsMin a ∧ ∀ ⦃b c⦄, a ≤ b ⊔ c → a ≤ b ∨ a ≤ c #align sup_prime SupPrime theorem SupIrred.not_isMin (ha : SupIrred a) : ¬IsMin a := ha.1 #align sup_irred.not_is_min SupIrred.not_isMin theorem SupPrime.not_isMin (ha : SupPrime a) : ¬IsMin a := ha.1 #align sup_prime.not_is_min SupPrime.not_isMin theorem IsMin.not_supIrred (ha : IsMin a) : ¬SupIrred a := fun h => h.1 ha #align is_min.not_sup_irred IsMin.not_supIrred theorem IsMin.not_supPrime (ha : IsMin a) : ¬SupPrime a := fun h => h.1 ha #align is_min.not_sup_prime IsMin.not_supPrime @[simp] theorem not_supIrred : ¬SupIrred a ↔ IsMin a ∨ ∃ b c, b ⊔ c = a ∧ b < a ∧ c < a := by rw [SupIrred, not_and_or] push_neg rw [exists₂_congr] simp (config := { contextual := true }) [@eq_comm _ _ a] #align not_sup_irred not_supIrred @[simp] theorem not_supPrime : ¬SupPrime a ↔ IsMin a ∨ ∃ b c, a ≤ b ⊔ c ∧ ¬a ≤ b ∧ ¬a ≤ c := by rw [SupPrime, not_and_or]; push_neg; rfl #align not_sup_prime not_supPrime protected theorem SupPrime.supIrred : SupPrime a → SupIrred a := And.imp_right fun h b c ha => by simpa [← ha] using h ha.ge #align sup_prime.sup_irred SupPrime.supIrred theorem SupPrime.le_sup (ha : SupPrime a) : a ≤ b ⊔ c ↔ a ≤ b ∨ a ≤ c := ⟨fun h => ha.2 h, fun h => h.elim le_sup_of_le_left le_sup_of_le_right⟩ #align sup_prime.le_sup SupPrime.le_sup variable [OrderBot α] {s : Finset ι} {f : ι → α} @[simp] theorem not_supIrred_bot : ¬SupIrred (⊥ : α) := isMin_bot.not_supIrred #align not_sup_irred_bot not_supIrred_bot @[simp] theorem not_supPrime_bot : ¬SupPrime (⊥ : α) := isMin_bot.not_supPrime #align not_sup_prime_bot not_supPrime_bot theorem SupIrred.ne_bot (ha : SupIrred a) : a ≠ ⊥ := by rintro rfl; exact not_supIrred_bot ha #align sup_irred.ne_bot SupIrred.ne_bot	Mathlib/Order/Irreducible.lean	107	107	theorem SupPrime.ne_bot (ha : SupPrime a) : a ≠ ⊥ := by	rintro rfl; exact not_supPrime_bot ha
import Mathlib.Analysis.BoxIntegral.Partition.SubboxInduction import Mathlib.Analysis.BoxIntegral.Partition.Split #align_import analysis.box_integral.partition.filter from "leanprover-community/mathlib"@"92ca63f0fb391a9ca5f22d2409a6080e786d99f7" open Set Function Filter Metric Finset Bool open scoped Classical open Topology Filter NNReal noncomputable section namespace BoxIntegral variable {ι : Type} [Fintype ι] {I J : Box ι} {c c₁ c₂ : ℝ≥0} {r r₁ r₂ : (ι → ℝ) → Ioi (0 : ℝ)} {π π₁ π₂ : TaggedPrepartition I} open TaggedPrepartition @[ext] structure IntegrationParams : Type where (bRiemann bHenstock bDistortion : Bool) #align box_integral.integration_params BoxIntegral.IntegrationParams variable {l l₁ l₂ : IntegrationParams} namespace IntegrationParams def equivProd : IntegrationParams ≃ Bool × Boolᵒᵈ × Boolᵒᵈ where toFun l := ⟨l.1, OrderDual.toDual l.2, OrderDual.toDual l.3⟩ invFun l := ⟨l.1, OrderDual.ofDual l.2.1, OrderDual.ofDual l.2.2⟩ left_inv _ := rfl right_inv _ := rfl #align box_integral.integration_params.equiv_prod BoxIntegral.IntegrationParams.equivProd instance : PartialOrder IntegrationParams := PartialOrder.lift equivProd equivProd.injective def isoProd : IntegrationParams ≃o Bool × Boolᵒᵈ × Boolᵒᵈ := ⟨equivProd, Iff.rfl⟩ #align box_integral.integration_params.iso_prod BoxIntegral.IntegrationParams.isoProd instance : BoundedOrder IntegrationParams := isoProd.symm.toGaloisInsertion.liftBoundedOrder instance : Inhabited IntegrationParams := ⟨⊥⟩ instance : DecidableRel ((· ≤ ·) : IntegrationParams → IntegrationParams → Prop) := fun _ _ => And.decidable instance : DecidableEq IntegrationParams := fun x y => decidable_of_iff _ (IntegrationParams.ext_iff x y).symm def Riemann : IntegrationParams where bRiemann := true bHenstock := true bDistortion := false set_option linter.uppercaseLean3 false in #align box_integral.integration_params.Riemann BoxIntegral.IntegrationParams.Riemann def Henstock : IntegrationParams := ⟨false, true, false⟩ set_option linter.uppercaseLean3 false in #align box_integral.integration_params.Henstock BoxIntegral.IntegrationParams.Henstock def McShane : IntegrationParams := ⟨false, false, false⟩ set_option linter.uppercaseLean3 false in #align box_integral.integration_params.McShane BoxIntegral.IntegrationParams.McShane def GP : IntegrationParams := ⊥ set_option linter.uppercaseLean3 false in #align box_integral.integration_params.GP BoxIntegral.IntegrationParams.GP theorem henstock_le_riemann : Henstock ≤ Riemann := by trivial set_option linter.uppercaseLean3 false in #align box_integral.integration_params.Henstock_le_Riemann BoxIntegral.IntegrationParams.henstock_le_riemann theorem henstock_le_mcShane : Henstock ≤ McShane := by trivial set_option linter.uppercaseLean3 false in #align box_integral.integration_params.Henstock_le_McShane BoxIntegral.IntegrationParams.henstock_le_mcShane theorem gp_le : GP ≤ l := bot_le set_option linter.uppercaseLean3 false in #align box_integral.integration_params.GP_le BoxIntegral.IntegrationParams.gp_le structure MemBaseSet (l : IntegrationParams) (I : Box ι) (c : ℝ≥0) (r : (ι → ℝ) → Ioi (0 : ℝ)) (π : TaggedPrepartition I) : Prop where protected isSubordinate : π.IsSubordinate r protected isHenstock : l.bHenstock → π.IsHenstock protected distortion_le : l.bDistortion → π.distortion ≤ c protected exists_compl : l.bDistortion → ∃ π' : Prepartition I, π'.iUnion = ↑I \ π.iUnion ∧ π'.distortion ≤ c #align box_integral.integration_params.mem_base_set BoxIntegral.IntegrationParams.MemBaseSet def RCond {ι : Type} (l : IntegrationParams) (r : (ι → ℝ) → Ioi (0 : ℝ)) : Prop := l.bRiemann → ∀ x, r x = r 0 #align box_integral.integration_params.r_cond BoxIntegral.IntegrationParams.RCond def toFilterDistortion (l : IntegrationParams) (I : Box ι) (c : ℝ≥0) : Filter (TaggedPrepartition I) := ⨅ (r : (ι → ℝ) → Ioi (0 : ℝ)) (_ : l.RCond r), 𝓟 { π \| l.MemBaseSet I c r π } #align box_integral.integration_params.to_filter_distortion BoxIntegral.IntegrationParams.toFilterDistortion def toFilter (l : IntegrationParams) (I : Box ι) : Filter (TaggedPrepartition I) := ⨆ c : ℝ≥0, l.toFilterDistortion I c #align box_integral.integration_params.to_filter BoxIntegral.IntegrationParams.toFilter def toFilterDistortioniUnion (l : IntegrationParams) (I : Box ι) (c : ℝ≥0) (π₀ : Prepartition I) := l.toFilterDistortion I c ⊓ 𝓟 { π \| π.iUnion = π₀.iUnion } #align box_integral.integration_params.to_filter_distortion_Union BoxIntegral.IntegrationParams.toFilterDistortioniUnion def toFilteriUnion (l : IntegrationParams) (I : Box ι) (π₀ : Prepartition I) := ⨆ c : ℝ≥0, l.toFilterDistortioniUnion I c π₀ #align box_integral.integration_params.to_filter_Union BoxIntegral.IntegrationParams.toFilteriUnion theorem rCond_of_bRiemann_eq_false {ι} (l : IntegrationParams) (hl : l.bRiemann = false) {r : (ι → ℝ) → Ioi (0 : ℝ)} : l.RCond r := by simp [RCond, hl] set_option linter.uppercaseLean3 false in #align box_integral.integration_params.r_cond_of_bRiemann_eq_ff BoxIntegral.IntegrationParams.rCond_of_bRiemann_eq_false theorem toFilter_inf_iUnion_eq (l : IntegrationParams) (I : Box ι) (π₀ : Prepartition I) : l.toFilter I ⊓ 𝓟 { π \| π.iUnion = π₀.iUnion } = l.toFilteriUnion I π₀ := (iSup_inf_principal _ _).symm #align box_integral.integration_params.to_filter_inf_Union_eq BoxIntegral.IntegrationParams.toFilter_inf_iUnion_eq theorem MemBaseSet.mono' (I : Box ι) (h : l₁ ≤ l₂) (hc : c₁ ≤ c₂) {π : TaggedPrepartition I} (hr : ∀ J ∈ π, r₁ (π.tag J) ≤ r₂ (π.tag J)) (hπ : l₁.MemBaseSet I c₁ r₁ π) : l₂.MemBaseSet I c₂ r₂ π := ⟨hπ.1.mono' hr, fun h₂ => hπ.2 (le_iff_imp.1 h.2.1 h₂), fun hD => (hπ.3 (le_iff_imp.1 h.2.2 hD)).trans hc, fun hD => (hπ.4 (le_iff_imp.1 h.2.2 hD)).imp fun _ hπ => ⟨hπ.1, hπ.2.trans hc⟩⟩ #align box_integral.integration_params.mem_base_set.mono' BoxIntegral.IntegrationParams.MemBaseSet.mono' @[mono] theorem MemBaseSet.mono (I : Box ι) (h : l₁ ≤ l₂) (hc : c₁ ≤ c₂) {π : TaggedPrepartition I} (hr : ∀ x ∈ Box.Icc I, r₁ x ≤ r₂ x) (hπ : l₁.MemBaseSet I c₁ r₁ π) : l₂.MemBaseSet I c₂ r₂ π := hπ.mono' I h hc fun J _ => hr _ <\| π.tag_mem_Icc J #align box_integral.integration_params.mem_base_set.mono BoxIntegral.IntegrationParams.MemBaseSet.mono theorem MemBaseSet.exists_common_compl (h₁ : l.MemBaseSet I c₁ r₁ π₁) (h₂ : l.MemBaseSet I c₂ r₂ π₂) (hU : π₁.iUnion = π₂.iUnion) : ∃ π : Prepartition I, π.iUnion = ↑I \ π₁.iUnion ∧ (l.bDistortion → π.distortion ≤ c₁) ∧ (l.bDistortion → π.distortion ≤ c₂) := by wlog hc : c₁ ≤ c₂ with H · simpa [hU, _root_.and_comm] using @H _ _ I J c c₂ c₁ r r₂ r₁ π π₂ π₁ _ l₂ l₁ h₂ h₁ hU.symm (le_of_not_le hc) by_cases hD : (l.bDistortion : Prop) · rcases h₁.4 hD with ⟨π, hπU, hπc⟩ exact ⟨π, hπU, fun _ => hπc, fun _ => hπc.trans hc⟩ · exact ⟨π₁.toPrepartition.compl, π₁.toPrepartition.iUnion_compl, fun h => (hD h).elim, fun h => (hD h).elim⟩ #align box_integral.integration_params.mem_base_set.exists_common_compl BoxIntegral.IntegrationParams.MemBaseSet.exists_common_compl protected theorem MemBaseSet.unionComplToSubordinate (hπ₁ : l.MemBaseSet I c r₁ π₁) (hle : ∀ x ∈ Box.Icc I, r₂ x ≤ r₁ x) {π₂ : Prepartition I} (hU : π₂.iUnion = ↑I \ π₁.iUnion) (hc : l.bDistortion → π₂.distortion ≤ c) : l.MemBaseSet I c r₁ (π₁.unionComplToSubordinate π₂ hU r₂) := ⟨hπ₁.1.disjUnion ((π₂.isSubordinate_toSubordinate r₂).mono hle) _, fun h => (hπ₁.2 h).disjUnion (π₂.isHenstock_toSubordinate _) _, fun h => (distortion_unionComplToSubordinate _ _ _ _).trans_le (max_le (hπ₁.3 h) (hc h)), fun _ => ⟨⊥, by simp⟩⟩ #align box_integral.integration_params.mem_base_set.union_compl_to_subordinate BoxIntegral.IntegrationParams.MemBaseSet.unionComplToSubordinate protected theorem MemBaseSet.filter (hπ : l.MemBaseSet I c r π) (p : Box ι → Prop) : l.MemBaseSet I c r (π.filter p) := by refine ⟨fun J hJ => hπ.1 J (π.mem_filter.1 hJ).1, fun hH J hJ => hπ.2 hH J (π.mem_filter.1 hJ).1, fun hD => (distortion_filter_le _ _).trans (hπ.3 hD), fun hD => ?_⟩ rcases hπ.4 hD with ⟨π₁, hπ₁U, hc⟩ set π₂ := π.filter fun J => ¬p J have : Disjoint π₁.iUnion π₂.iUnion := by simpa [π₂, hπ₁U] using disjoint_sdiff_self_left.mono_right sdiff_le refine ⟨π₁.disjUnion π₂.toPrepartition this, ?_, ?_⟩ · suffices ↑I \ π.iUnion ∪ π.iUnion \ (π.filter p).iUnion = ↑I \ (π.filter p).iUnion by simp [π₂, *] have h : (π.filter p).iUnion ⊆ π.iUnion := biUnion_subset_biUnion_left (Finset.filter_subset _ _) ext x fconstructor · rintro (⟨hxI, hxπ⟩ \| ⟨hxπ, hxp⟩) exacts [⟨hxI, mt (@h x) hxπ⟩, ⟨π.iUnion_subset hxπ, hxp⟩] · rintro ⟨hxI, hxp⟩ by_cases hxπ : x ∈ π.iUnion exacts [Or.inr ⟨hxπ, hxp⟩, Or.inl ⟨hxI, hxπ⟩] · have : (π.filter fun J => ¬p J).distortion ≤ c := (distortion_filter_le _ _).trans (hπ.3 hD) simpa [hc] #align box_integral.integration_params.mem_base_set.filter BoxIntegral.IntegrationParams.MemBaseSet.filter	Mathlib/Analysis/BoxIntegral/Partition/Filter.lean	420	430	theorem biUnionTagged_memBaseSet {π : Prepartition I} {πi : ∀ J, TaggedPrepartition J} (h : ∀ J ∈ π, l.MemBaseSet J c r (πi J)) (hp : ∀ J ∈ π, (πi J).IsPartition) (hc : l.bDistortion → π.compl.distortion ≤ c) : l.MemBaseSet I c r (π.biUnionTagged πi) := by	refine ⟨TaggedPrepartition.isSubordinate_biUnionTagged.2 fun J hJ => (h J hJ).1, fun hH => TaggedPrepartition.isHenstock_biUnionTagged.2 fun J hJ => (h J hJ).2 hH, fun hD => ?_, fun hD => ?_⟩ · rw [Prepartition.distortion_biUnionTagged, Finset.sup_le_iff] exact fun J hJ => (h J hJ).3 hD · refine ⟨_, ?_, hc hD⟩ rw [π.iUnion_compl, ← π.iUnion_biUnion_partition hp] rfl
import Mathlib.GroupTheory.GroupAction.ConjAct import Mathlib.GroupTheory.GroupAction.Quotient import Mathlib.GroupTheory.QuotientGroup import Mathlib.Topology.Algebra.Monoid import Mathlib.Topology.Algebra.Constructions #align_import topology.algebra.group.basic from "leanprover-community/mathlib"@"3b1890e71632be9e3b2086ab512c3259a7e9a3ef" open scoped Classical open Set Filter TopologicalSpace Function Topology Pointwise MulOpposite universe u v w x variable {G : Type w} {H : Type x} {α : Type u} {β : Type v} class ContinuousNeg (G : Type u) [TopologicalSpace G] [Neg G] : Prop where continuous_neg : Continuous fun a : G => -a #align has_continuous_neg ContinuousNeg -- Porting note: added attribute [continuity] ContinuousNeg.continuous_neg @[to_additive (attr := continuity)] class ContinuousInv (G : Type u) [TopologicalSpace G] [Inv G] : Prop where continuous_inv : Continuous fun a : G => a⁻¹ #align has_continuous_inv ContinuousInv --#align has_continuous_neg ContinuousNeg -- Porting note: added attribute [continuity] ContinuousInv.continuous_inv export ContinuousInv (continuous_inv) export ContinuousNeg (continuous_neg) section ContinuousInv variable [TopologicalSpace G] [Inv G] [ContinuousInv G] @[to_additive] protected theorem Specializes.inv {x y : G} (h : x ⤳ y) : (x⁻¹) ⤳ (y⁻¹) := h.map continuous_inv @[to_additive] protected theorem Inseparable.inv {x y : G} (h : Inseparable x y) : Inseparable (x⁻¹) (y⁻¹) := h.map continuous_inv @[to_additive] protected theorem Specializes.zpow {G : Type} [DivInvMonoid G] [TopologicalSpace G] [ContinuousMul G] [ContinuousInv G] {x y : G} (h : x ⤳ y) : ∀ m : ℤ, (x ^ m) ⤳ (y ^ m) \| .ofNat n => by simpa using h.pow n \| .negSucc n => by simpa using (h.pow (n + 1)).inv @[to_additive] protected theorem Inseparable.zpow {G : Type} [DivInvMonoid G] [TopologicalSpace G] [ContinuousMul G] [ContinuousInv G] {x y : G} (h : Inseparable x y) (m : ℤ) : Inseparable (x ^ m) (y ^ m) := (h.specializes.zpow m).antisymm (h.specializes'.zpow m) @[to_additive] instance : ContinuousInv (ULift G) := ⟨continuous_uLift_up.comp (continuous_inv.comp continuous_uLift_down)⟩ @[to_additive] theorem continuousOn_inv {s : Set G} : ContinuousOn Inv.inv s := continuous_inv.continuousOn #align continuous_on_inv continuousOn_inv #align continuous_on_neg continuousOn_neg @[to_additive] theorem continuousWithinAt_inv {s : Set G} {x : G} : ContinuousWithinAt Inv.inv s x := continuous_inv.continuousWithinAt #align continuous_within_at_inv continuousWithinAt_inv #align continuous_within_at_neg continuousWithinAt_neg @[to_additive] theorem continuousAt_inv {x : G} : ContinuousAt Inv.inv x := continuous_inv.continuousAt #align continuous_at_inv continuousAt_inv #align continuous_at_neg continuousAt_neg @[to_additive] theorem tendsto_inv (a : G) : Tendsto Inv.inv (𝓝 a) (𝓝 a⁻¹) := continuousAt_inv #align tendsto_inv tendsto_inv #align tendsto_neg tendsto_neg @[to_additive "If a function converges to a value in an additive topological group, then its negation converges to the negation of this value."] theorem Filter.Tendsto.inv {f : α → G} {l : Filter α} {y : G} (h : Tendsto f l (𝓝 y)) : Tendsto (fun x => (f x)⁻¹) l (𝓝 y⁻¹) := (continuous_inv.tendsto y).comp h #align filter.tendsto.inv Filter.Tendsto.inv #align filter.tendsto.neg Filter.Tendsto.neg variable [TopologicalSpace α] {f : α → G} {s : Set α} {x : α} @[to_additive (attr := continuity, fun_prop)] theorem Continuous.inv (hf : Continuous f) : Continuous fun x => (f x)⁻¹ := continuous_inv.comp hf #align continuous.inv Continuous.inv #align continuous.neg Continuous.neg @[to_additive (attr := fun_prop)] theorem ContinuousAt.inv (hf : ContinuousAt f x) : ContinuousAt (fun x => (f x)⁻¹) x := continuousAt_inv.comp hf #align continuous_at.inv ContinuousAt.inv #align continuous_at.neg ContinuousAt.neg @[to_additive (attr := fun_prop)] theorem ContinuousOn.inv (hf : ContinuousOn f s) : ContinuousOn (fun x => (f x)⁻¹) s := continuous_inv.comp_continuousOn hf #align continuous_on.inv ContinuousOn.inv #align continuous_on.neg ContinuousOn.neg @[to_additive] theorem ContinuousWithinAt.inv (hf : ContinuousWithinAt f s x) : ContinuousWithinAt (fun x => (f x)⁻¹) s x := Filter.Tendsto.inv hf #align continuous_within_at.inv ContinuousWithinAt.inv #align continuous_within_at.neg ContinuousWithinAt.neg @[to_additive] instance Prod.continuousInv [TopologicalSpace H] [Inv H] [ContinuousInv H] : ContinuousInv (G × H) := ⟨continuous_inv.fst'.prod_mk continuous_inv.snd'⟩ variable {ι : Type} @[to_additive] instance Pi.continuousInv {C : ι → Type} [∀ i, TopologicalSpace (C i)] [∀ i, Inv (C i)] [∀ i, ContinuousInv (C i)] : ContinuousInv (∀ i, C i) where continuous_inv := continuous_pi fun i => (continuous_apply i).inv #align pi.has_continuous_inv Pi.continuousInv #align pi.has_continuous_neg Pi.continuousNeg @[to_additive "A version of `Pi.continuousNeg` for non-dependent functions. It is needed because sometimes Lean fails to use `Pi.continuousNeg` for non-dependent functions."] instance Pi.has_continuous_inv' : ContinuousInv (ι → G) := Pi.continuousInv #align pi.has_continuous_inv' Pi.has_continuous_inv' #align pi.has_continuous_neg' Pi.has_continuous_neg' @[to_additive] instance (priority := 100) continuousInv_of_discreteTopology [TopologicalSpace H] [Inv H] [DiscreteTopology H] : ContinuousInv H := ⟨continuous_of_discreteTopology⟩ #align has_continuous_inv_of_discrete_topology continuousInv_of_discreteTopology #align has_continuous_neg_of_discrete_topology continuousNeg_of_discreteTopology section LatticeOps variable {ι' : Sort*} [Inv G] @[to_additive] theorem continuousInv_sInf {ts : Set (TopologicalSpace G)} (h : ∀ t ∈ ts, @ContinuousInv G t _) : @ContinuousInv G (sInf ts) _ := letI := sInf ts { continuous_inv := continuous_sInf_rng.2 fun t ht => continuous_sInf_dom ht (@ContinuousInv.continuous_inv G t _ (h t ht)) } #align has_continuous_inv_Inf continuousInv_sInf #align has_continuous_neg_Inf continuousNeg_sInf @[to_additive]	Mathlib/Topology/Algebra/Group/Basic.lean	415	418	theorem continuousInv_iInf {ts' : ι' → TopologicalSpace G} (h' : ∀ i, @ContinuousInv G (ts' i) _) : @ContinuousInv G (⨅ i, ts' i) _ := by	rw [← sInf_range] exact continuousInv_sInf (Set.forall_mem_range.mpr h')
import Mathlib.Data.Fin.VecNotation import Mathlib.Logic.Embedding.Set #align_import logic.equiv.fin from "leanprover-community/mathlib"@"bd835ef554f37ef9b804f0903089211f89cb370b" assert_not_exists MonoidWithZero universe u variable {m n : ℕ} def finZeroEquiv : Fin 0 ≃ Empty := Equiv.equivEmpty _ #align fin_zero_equiv finZeroEquiv def finZeroEquiv' : Fin 0 ≃ PEmpty.{u} := Equiv.equivPEmpty _ #align fin_zero_equiv' finZeroEquiv' def finOneEquiv : Fin 1 ≃ Unit := Equiv.equivPUnit _ #align fin_one_equiv finOneEquiv def finTwoEquiv : Fin 2 ≃ Bool where toFun := ![false, true] invFun b := b.casesOn 0 1 left_inv := Fin.forall_fin_two.2 <\| by simp right_inv := Bool.forall_bool.2 <\| by simp #align fin_two_equiv finTwoEquiv @[simps (config := .asFn)] def piFinTwoEquiv (α : Fin 2 → Type u) : (∀ i, α i) ≃ α 0 × α 1 where toFun f := (f 0, f 1) invFun p := Fin.cons p.1 <\| Fin.cons p.2 finZeroElim left_inv _ := funext <\| Fin.forall_fin_two.2 ⟨rfl, rfl⟩ right_inv := fun _ => rfl #align pi_fin_two_equiv piFinTwoEquiv #align pi_fin_two_equiv_symm_apply piFinTwoEquiv_symm_apply #align pi_fin_two_equiv_apply piFinTwoEquiv_apply theorem Fin.preimage_apply_01_prod {α : Fin 2 → Type u} (s : Set (α 0)) (t : Set (α 1)) : (fun f : ∀ i, α i => (f 0, f 1)) ⁻¹' s ×ˢ t = Set.pi Set.univ (Fin.cons s <\| Fin.cons t finZeroElim) := by ext f simp [Fin.forall_fin_two] #align fin.preimage_apply_01_prod Fin.preimage_apply_01_prod theorem Fin.preimage_apply_01_prod' {α : Type u} (s t : Set α) : (fun f : Fin 2 → α => (f 0, f 1)) ⁻¹' s ×ˢ t = Set.pi Set.univ ![s, t] := @Fin.preimage_apply_01_prod (fun _ => α) s t #align fin.preimage_apply_01_prod' Fin.preimage_apply_01_prod' @[simps! (config := .asFn)] def prodEquivPiFinTwo (α β : Type u) : α × β ≃ ∀ i : Fin 2, ![α, β] i := (piFinTwoEquiv (Fin.cons α (Fin.cons β finZeroElim))).symm #align prod_equiv_pi_fin_two prodEquivPiFinTwo #align prod_equiv_pi_fin_two_apply prodEquivPiFinTwo_apply #align prod_equiv_pi_fin_two_symm_apply prodEquivPiFinTwo_symm_apply @[simps (config := .asFn)] def finTwoArrowEquiv (α : Type) : (Fin 2 → α) ≃ α × α := { piFinTwoEquiv fun _ => α with invFun := fun x => ![x.1, x.2] } #align fin_two_arrow_equiv finTwoArrowEquiv #align fin_two_arrow_equiv_symm_apply finTwoArrowEquiv_symm_apply #align fin_two_arrow_equiv_apply finTwoArrowEquiv_apply def OrderIso.piFinTwoIso (α : Fin 2 → Type u) [∀ i, Preorder (α i)] : (∀ i, α i) ≃o α 0 × α 1 where toEquiv := piFinTwoEquiv α map_rel_iff' := Iff.symm Fin.forall_fin_two #align order_iso.pi_fin_two_iso OrderIso.piFinTwoIso def OrderIso.finTwoArrowIso (α : Type) [Preorder α] : (Fin 2 → α) ≃o α × α := { OrderIso.piFinTwoIso fun _ => α with toEquiv := finTwoArrowEquiv α } #align order_iso.fin_two_arrow_iso OrderIso.finTwoArrowIso def finSuccEquiv' (i : Fin (n + 1)) : Fin (n + 1) ≃ Option (Fin n) where toFun := i.insertNth none some invFun x := x.casesOn' i (Fin.succAbove i) left_inv x := Fin.succAboveCases i (by simp) (fun j => by simp) x right_inv x := by cases x <;> dsimp <;> simp #align fin_succ_equiv' finSuccEquiv' @[simp]	Mathlib/Logic/Equiv/Fin.lean	111	112	theorem finSuccEquiv'_at (i : Fin (n + 1)) : (finSuccEquiv' i) i = none := by	simp [finSuccEquiv']
import Mathlib.Analysis.SpecialFunctions.Exp import Mathlib.Data.Nat.Factorization.Basic import Mathlib.Analysis.NormedSpace.Real #align_import analysis.special_functions.log.basic from "leanprover-community/mathlib"@"f23a09ce6d3f367220dc3cecad6b7eb69eb01690" open Set Filter Function open Topology noncomputable section namespace Real variable {x y : ℝ} -- @[pp_nodot] -- Porting note: removed noncomputable def log (x : ℝ) : ℝ := if hx : x = 0 then 0 else expOrderIso.symm ⟨\|x\|, abs_pos.2 hx⟩ #align real.log Real.log theorem log_of_ne_zero (hx : x ≠ 0) : log x = expOrderIso.symm ⟨\|x\|, abs_pos.2 hx⟩ := dif_neg hx #align real.log_of_ne_zero Real.log_of_ne_zero theorem log_of_pos (hx : 0 < x) : log x = expOrderIso.symm ⟨x, hx⟩ := by rw [log_of_ne_zero hx.ne'] congr exact abs_of_pos hx #align real.log_of_pos Real.log_of_pos theorem exp_log_eq_abs (hx : x ≠ 0) : exp (log x) = \|x\| := by rw [log_of_ne_zero hx, ← coe_expOrderIso_apply, OrderIso.apply_symm_apply, Subtype.coe_mk] #align real.exp_log_eq_abs Real.exp_log_eq_abs theorem exp_log (hx : 0 < x) : exp (log x) = x := by rw [exp_log_eq_abs hx.ne'] exact abs_of_pos hx #align real.exp_log Real.exp_log theorem exp_log_of_neg (hx : x < 0) : exp (log x) = -x := by rw [exp_log_eq_abs (ne_of_lt hx)] exact abs_of_neg hx #align real.exp_log_of_neg Real.exp_log_of_neg theorem le_exp_log (x : ℝ) : x ≤ exp (log x) := by by_cases h_zero : x = 0 · rw [h_zero, log, dif_pos rfl, exp_zero] exact zero_le_one · rw [exp_log_eq_abs h_zero] exact le_abs_self _ #align real.le_exp_log Real.le_exp_log @[simp] theorem log_exp (x : ℝ) : log (exp x) = x := exp_injective <\| exp_log (exp_pos x) #align real.log_exp Real.log_exp theorem surjOn_log : SurjOn log (Ioi 0) univ := fun x _ => ⟨exp x, exp_pos x, log_exp x⟩ #align real.surj_on_log Real.surjOn_log theorem log_surjective : Surjective log := fun x => ⟨exp x, log_exp x⟩ #align real.log_surjective Real.log_surjective @[simp] theorem range_log : range log = univ := log_surjective.range_eq #align real.range_log Real.range_log @[simp] theorem log_zero : log 0 = 0 := dif_pos rfl #align real.log_zero Real.log_zero @[simp] theorem log_one : log 1 = 0 := exp_injective <\| by rw [exp_log zero_lt_one, exp_zero] #align real.log_one Real.log_one @[simp] theorem log_abs (x : ℝ) : log \|x\| = log x := by by_cases h : x = 0 · simp [h] · rw [← exp_eq_exp, exp_log_eq_abs h, exp_log_eq_abs (abs_pos.2 h).ne', abs_abs] #align real.log_abs Real.log_abs @[simp] theorem log_neg_eq_log (x : ℝ) : log (-x) = log x := by rw [← log_abs x, ← log_abs (-x), abs_neg] #align real.log_neg_eq_log Real.log_neg_eq_log theorem sinh_log {x : ℝ} (hx : 0 < x) : sinh (log x) = (x - x⁻¹) / 2 := by rw [sinh_eq, exp_neg, exp_log hx] #align real.sinh_log Real.sinh_log theorem cosh_log {x : ℝ} (hx : 0 < x) : cosh (log x) = (x + x⁻¹) / 2 := by rw [cosh_eq, exp_neg, exp_log hx] #align real.cosh_log Real.cosh_log theorem surjOn_log' : SurjOn log (Iio 0) univ := fun x _ => ⟨-exp x, neg_lt_zero.2 <\| exp_pos x, by rw [log_neg_eq_log, log_exp]⟩ #align real.surj_on_log' Real.surjOn_log' theorem log_mul (hx : x ≠ 0) (hy : y ≠ 0) : log (x * y) = log x + log y := exp_injective <\| by rw [exp_log_eq_abs (mul_ne_zero hx hy), exp_add, exp_log_eq_abs hx, exp_log_eq_abs hy, abs_mul] #align real.log_mul Real.log_mul theorem log_div (hx : x ≠ 0) (hy : y ≠ 0) : log (x / y) = log x - log y := exp_injective <\| by rw [exp_log_eq_abs (div_ne_zero hx hy), exp_sub, exp_log_eq_abs hx, exp_log_eq_abs hy, abs_div] #align real.log_div Real.log_div @[simp] theorem log_inv (x : ℝ) : log x⁻¹ = -log x := by by_cases hx : x = 0; · simp [hx] rw [← exp_eq_exp, exp_log_eq_abs (inv_ne_zero hx), exp_neg, exp_log_eq_abs hx, abs_inv] #align real.log_inv Real.log_inv theorem log_le_log_iff (h : 0 < x) (h₁ : 0 < y) : log x ≤ log y ↔ x ≤ y := by rw [← exp_le_exp, exp_log h, exp_log h₁] #align real.log_le_log Real.log_le_log_iff @[gcongr] lemma log_le_log (hx : 0 < x) (hxy : x ≤ y) : log x ≤ log y := (log_le_log_iff hx (hx.trans_le hxy)).2 hxy @[gcongr] theorem log_lt_log (hx : 0 < x) (h : x < y) : log x < log y := by rwa [← exp_lt_exp, exp_log hx, exp_log (lt_trans hx h)] #align real.log_lt_log Real.log_lt_log theorem log_lt_log_iff (hx : 0 < x) (hy : 0 < y) : log x < log y ↔ x < y := by rw [← exp_lt_exp, exp_log hx, exp_log hy] #align real.log_lt_log_iff Real.log_lt_log_iff theorem log_le_iff_le_exp (hx : 0 < x) : log x ≤ y ↔ x ≤ exp y := by rw [← exp_le_exp, exp_log hx] #align real.log_le_iff_le_exp Real.log_le_iff_le_exp theorem log_lt_iff_lt_exp (hx : 0 < x) : log x < y ↔ x < exp y := by rw [← exp_lt_exp, exp_log hx] #align real.log_lt_iff_lt_exp Real.log_lt_iff_lt_exp theorem le_log_iff_exp_le (hy : 0 < y) : x ≤ log y ↔ exp x ≤ y := by rw [← exp_le_exp, exp_log hy] #align real.le_log_iff_exp_le Real.le_log_iff_exp_le	Mathlib/Analysis/SpecialFunctions/Log/Basic.lean	168	168	theorem lt_log_iff_exp_lt (hy : 0 < y) : x < log y ↔ exp x < y := by	rw [← exp_lt_exp, exp_log hy]
import Mathlib.MeasureTheory.Measure.GiryMonad import Mathlib.Dynamics.Ergodic.MeasurePreserving import Mathlib.MeasureTheory.Integral.Lebesgue import Mathlib.MeasureTheory.Measure.OpenPos #align_import measure_theory.constructions.prod.basic from "leanprover-community/mathlib"@"00abe0695d8767201e6d008afa22393978bb324d" noncomputable section open scoped Classical open Topology ENNReal MeasureTheory open Set Function Real ENNReal open MeasureTheory MeasurableSpace MeasureTheory.Measure open TopologicalSpace hiding generateFrom open Filter hiding prod_eq map variable {α α' β β' γ E : Type} theorem IsPiSystem.prod {C : Set (Set α)} {D : Set (Set β)} (hC : IsPiSystem C) (hD : IsPiSystem D) : IsPiSystem (image2 (· ×ˢ ·) C D) := by rintro _ ⟨s₁, hs₁, t₁, ht₁, rfl⟩ _ ⟨s₂, hs₂, t₂, ht₂, rfl⟩ hst rw [prod_inter_prod] at hst ⊢; rw [prod_nonempty_iff] at hst exact mem_image2_of_mem (hC _ hs₁ _ hs₂ hst.1) (hD _ ht₁ _ ht₂ hst.2) #align is_pi_system.prod IsPiSystem.prod theorem IsCountablySpanning.prod {C : Set (Set α)} {D : Set (Set β)} (hC : IsCountablySpanning C) (hD : IsCountablySpanning D) : IsCountablySpanning (image2 (· ×ˢ ·) C D) := by rcases hC, hD with ⟨⟨s, h1s, h2s⟩, t, h1t, h2t⟩ refine ⟨fun n => s n.unpair.1 ×ˢ t n.unpair.2, fun n => mem_image2_of_mem (h1s _) (h1t _), ?_⟩ rw [iUnion_unpair_prod, h2s, h2t, univ_prod_univ] #align is_countably_spanning.prod IsCountablySpanning.prod variable [MeasurableSpace α] [MeasurableSpace α'] [MeasurableSpace β] [MeasurableSpace β'] variable [MeasurableSpace γ] variable {μ μ' : Measure α} {ν ν' : Measure β} {τ : Measure γ} variable [NormedAddCommGroup E] theorem generateFrom_prod_eq {α β} {C : Set (Set α)} {D : Set (Set β)} (hC : IsCountablySpanning C) (hD : IsCountablySpanning D) : @Prod.instMeasurableSpace _ _ (generateFrom C) (generateFrom D) = generateFrom (image2 (· ×ˢ ·) C D) := by apply le_antisymm · refine sup_le ?_ ?_ <;> rw [comap_generateFrom] <;> apply generateFrom_le <;> rintro _ ⟨s, hs, rfl⟩ · rcases hD with ⟨t, h1t, h2t⟩ rw [← prod_univ, ← h2t, prod_iUnion] apply MeasurableSet.iUnion intro n apply measurableSet_generateFrom exact ⟨s, hs, t n, h1t n, rfl⟩ · rcases hC with ⟨t, h1t, h2t⟩ rw [← univ_prod, ← h2t, iUnion_prod_const] apply MeasurableSet.iUnion rintro n apply measurableSet_generateFrom exact mem_image2_of_mem (h1t n) hs · apply generateFrom_le rintro _ ⟨s, hs, t, ht, rfl⟩ dsimp only rw [prod_eq] apply (measurable_fst _).inter (measurable_snd _) · exact measurableSet_generateFrom hs · exact measurableSet_generateFrom ht #align generate_from_prod_eq generateFrom_prod_eq theorem generateFrom_eq_prod {C : Set (Set α)} {D : Set (Set β)} (hC : generateFrom C = ‹_›) (hD : generateFrom D = ‹_›) (h2C : IsCountablySpanning C) (h2D : IsCountablySpanning D) : generateFrom (image2 (· ×ˢ ·) C D) = Prod.instMeasurableSpace := by rw [← hC, ← hD, generateFrom_prod_eq h2C h2D] #align generate_from_eq_prod generateFrom_eq_prod theorem generateFrom_prod : generateFrom (image2 (· ×ˢ ·) { s : Set α \| MeasurableSet s } { t : Set β \| MeasurableSet t }) = Prod.instMeasurableSpace := generateFrom_eq_prod generateFrom_measurableSet generateFrom_measurableSet isCountablySpanning_measurableSet isCountablySpanning_measurableSet #align generate_from_prod generateFrom_prod theorem isPiSystem_prod : IsPiSystem (image2 (· ×ˢ ·) { s : Set α \| MeasurableSet s } { t : Set β \| MeasurableSet t }) := isPiSystem_measurableSet.prod isPiSystem_measurableSet #align is_pi_system_prod isPiSystem_prod theorem measurable_measure_prod_mk_left_finite [IsFiniteMeasure ν] {s : Set (α × β)} (hs : MeasurableSet s) : Measurable fun x => ν (Prod.mk x ⁻¹' s) := by refine induction_on_inter (C := fun s => Measurable fun x => ν (Prod.mk x ⁻¹' s)) generateFrom_prod.symm isPiSystem_prod ?_ ?_ ?_ ?_ hs · simp · rintro _ ⟨s, hs, t, _, rfl⟩ simp only [mk_preimage_prod_right_eq_if, measure_if] exact measurable_const.indicator hs · intro t ht h2t simp_rw [preimage_compl, measure_compl (measurable_prod_mk_left ht) (measure_ne_top ν _)] exact h2t.const_sub _ · intro f h1f h2f h3f simp_rw [preimage_iUnion] have : ∀ b, ν (⋃ i, Prod.mk b ⁻¹' f i) = ∑' i, ν (Prod.mk b ⁻¹' f i) := fun b => measure_iUnion (fun i j hij => Disjoint.preimage _ (h1f hij)) fun i => measurable_prod_mk_left (h2f i) simp_rw [this] apply Measurable.ennreal_tsum h3f #align measurable_measure_prod_mk_left_finite measurable_measure_prod_mk_left_finite theorem measurable_measure_prod_mk_left [SFinite ν] {s : Set (α × β)} (hs : MeasurableSet s) : Measurable fun x => ν (Prod.mk x ⁻¹' s) := by rw [← sum_sFiniteSeq ν] simp_rw [Measure.sum_apply_of_countable] exact Measurable.ennreal_tsum (fun i ↦ measurable_measure_prod_mk_left_finite hs) #align measurable_measure_prod_mk_left measurable_measure_prod_mk_left theorem measurable_measure_prod_mk_right {μ : Measure α} [SFinite μ] {s : Set (α × β)} (hs : MeasurableSet s) : Measurable fun y => μ ((fun x => (x, y)) ⁻¹' s) := measurable_measure_prod_mk_left (measurableSet_swap_iff.mpr hs) #align measurable_measure_prod_mk_right measurable_measure_prod_mk_right theorem Measurable.map_prod_mk_left [SFinite ν] : Measurable fun x : α => map (Prod.mk x) ν := by apply measurable_of_measurable_coe; intro s hs simp_rw [map_apply measurable_prod_mk_left hs] exact measurable_measure_prod_mk_left hs #align measurable.map_prod_mk_left Measurable.map_prod_mk_left theorem Measurable.map_prod_mk_right {μ : Measure α} [SFinite μ] : Measurable fun y : β => map (fun x : α => (x, y)) μ := by apply measurable_of_measurable_coe; intro s hs simp_rw [map_apply measurable_prod_mk_right hs] exact measurable_measure_prod_mk_right hs #align measurable.map_prod_mk_right Measurable.map_prod_mk_right theorem MeasurableEmbedding.prod_mk {α β γ δ : Type} {mα : MeasurableSpace α} {mβ : MeasurableSpace β} {mγ : MeasurableSpace γ} {mδ : MeasurableSpace δ} {f : α → β} {g : γ → δ} (hg : MeasurableEmbedding g) (hf : MeasurableEmbedding f) : MeasurableEmbedding fun x : γ × α => (g x.1, f x.2) := by have h_inj : Function.Injective fun x : γ × α => (g x.fst, f x.snd) := by intro x y hxy rw [← @Prod.mk.eta _ _ x, ← @Prod.mk.eta _ _ y] simp only [Prod.mk.inj_iff] at hxy ⊢ exact ⟨hg.injective hxy.1, hf.injective hxy.2⟩ refine ⟨h_inj, ?_, ?_⟩ · exact (hg.measurable.comp measurable_fst).prod_mk (hf.measurable.comp measurable_snd) · -- Induction using the π-system of rectangles refine fun s hs => @MeasurableSpace.induction_on_inter _ (fun s => MeasurableSet ((fun x : γ × α => (g x.fst, f x.snd)) '' s)) _ _ generateFrom_prod.symm isPiSystem_prod ?_ ?_ ?_ ?_ _ hs · simp only [Set.image_empty, MeasurableSet.empty] · rintro t ⟨t₁, ht₁, t₂, ht₂, rfl⟩ rw [← Set.prod_image_image_eq] exact (hg.measurableSet_image.mpr ht₁).prod (hf.measurableSet_image.mpr ht₂) · intro t _ ht_m rw [← Set.range_diff_image h_inj, ← Set.prod_range_range_eq] exact MeasurableSet.diff (MeasurableSet.prod hg.measurableSet_range hf.measurableSet_range) ht_m · intro g _ _ hg simp_rw [Set.image_iUnion] exact MeasurableSet.iUnion hg #align measurable_embedding.prod_mk MeasurableEmbedding.prod_mk lemma MeasurableEmbedding.prod_mk_left {β γ : Type} [MeasurableSingletonClass α] {mβ : MeasurableSpace β} {mγ : MeasurableSpace γ} (x : α) {f : γ → β} (hf : MeasurableEmbedding f) : MeasurableEmbedding (fun y ↦ (x, f y)) where injective := by intro y y' simp only [Prod.mk.injEq, true_and] exact fun h ↦ hf.injective h measurable := Measurable.prod_mk measurable_const hf.measurable measurableSet_image' := by intro s hs convert (MeasurableSet.singleton x).prod (hf.measurableSet_image.mpr hs) ext x simp lemma measurableEmbedding_prod_mk_left [MeasurableSingletonClass α] (x : α) : MeasurableEmbedding (Prod.mk x : β → α × β) := MeasurableEmbedding.prod_mk_left x MeasurableEmbedding.id lemma MeasurableEmbedding.prod_mk_right {β γ : Type} [MeasurableSingletonClass α] {mβ : MeasurableSpace β} {mγ : MeasurableSpace γ} {f : γ → β} (hf : MeasurableEmbedding f) (x : α) : MeasurableEmbedding (fun y ↦ (f y, x)) where injective := by intro y y' simp only [Prod.mk.injEq, and_true] exact fun h ↦ hf.injective h measurable := Measurable.prod_mk hf.measurable measurable_const measurableSet_image' := by intro s hs convert (hf.measurableSet_image.mpr hs).prod (MeasurableSet.singleton x) ext x simp lemma measurableEmbedding_prod_mk_right [MeasurableSingletonClass α] (x : α) : MeasurableEmbedding (fun y ↦ (y, x) : β → β × α) := MeasurableEmbedding.prod_mk_right MeasurableEmbedding.id x theorem Measurable.lintegral_prod_right' [SFinite ν] : ∀ {f : α × β → ℝ≥0∞}, Measurable f → Measurable fun x => ∫⁻ y, f (x, y) ∂ν := by have m := @measurable_prod_mk_left refine Measurable.ennreal_induction (P := fun f => Measurable fun (x : α) => ∫⁻ y, f (x, y) ∂ν) ?_ ?_ ?_ · intro c s hs simp only [← indicator_comp_right] suffices Measurable fun x => c * ν (Prod.mk x ⁻¹' s) by simpa [lintegral_indicator _ (m hs)] exact (measurable_measure_prod_mk_left hs).const_mul _ · rintro f g - hf - h2f h2g simp only [Pi.add_apply] conv => enter [1, x]; erw [lintegral_add_left (hf.comp m)] exact h2f.add h2g · intro f hf h2f h3f have := measurable_iSup h3f have : ∀ x, Monotone fun n y => f n (x, y) := fun x i j hij y => h2f hij (x, y) conv => enter [1, x]; erw [lintegral_iSup (fun n => (hf n).comp m) (this x)] assumption #align measurable.lintegral_prod_right' Measurable.lintegral_prod_right' theorem Measurable.lintegral_prod_right [SFinite ν] {f : α → β → ℝ≥0∞} (hf : Measurable (uncurry f)) : Measurable fun x => ∫⁻ y, f x y ∂ν := hf.lintegral_prod_right' #align measurable.lintegral_prod_right Measurable.lintegral_prod_right theorem Measurable.lintegral_prod_left' [SFinite μ] {f : α × β → ℝ≥0∞} (hf : Measurable f) : Measurable fun y => ∫⁻ x, f (x, y) ∂μ := (measurable_swap_iff.mpr hf).lintegral_prod_right' #align measurable.lintegral_prod_left' Measurable.lintegral_prod_left' theorem Measurable.lintegral_prod_left [SFinite μ] {f : α → β → ℝ≥0∞} (hf : Measurable (uncurry f)) : Measurable fun y => ∫⁻ x, f x y ∂μ := hf.lintegral_prod_left' #align measurable.lintegral_prod_left Measurable.lintegral_prod_left namespace MeasureTheory namespace Measure protected irreducible_def prod (μ : Measure α) (ν : Measure β) : Measure (α × β) := bind μ fun x : α => map (Prod.mk x) ν #align measure_theory.measure.prod MeasureTheory.Measure.prod instance prod.measureSpace {α β} [MeasureSpace α] [MeasureSpace β] : MeasureSpace (α × β) where volume := volume.prod volume #align measure_theory.measure.prod.measure_space MeasureTheory.Measure.prod.measureSpace theorem volume_eq_prod (α β) [MeasureSpace α] [MeasureSpace β] : (volume : Measure (α × β)) = (volume : Measure α).prod (volume : Measure β) := rfl #align measure_theory.measure.volume_eq_prod MeasureTheory.Measure.volume_eq_prod variable [SFinite ν] theorem prod_apply {s : Set (α × β)} (hs : MeasurableSet s) : μ.prod ν s = ∫⁻ x, ν (Prod.mk x ⁻¹' s) ∂μ := by simp_rw [Measure.prod, bind_apply hs (Measurable.map_prod_mk_left (ν := ν)), map_apply measurable_prod_mk_left hs] #align measure_theory.measure.prod_apply MeasureTheory.Measure.prod_apply @[simp] theorem prod_prod (s : Set α) (t : Set β) : μ.prod ν (s ×ˢ t) = μ s * ν t := by apply le_antisymm · set S := toMeasurable μ s set T := toMeasurable ν t have hSTm : MeasurableSet (S ×ˢ T) := (measurableSet_toMeasurable _ _).prod (measurableSet_toMeasurable _ _) calc μ.prod ν (s ×ˢ t) ≤ μ.prod ν (S ×ˢ T) := by gcongr <;> apply subset_toMeasurable _ = μ S * ν T := by rw [prod_apply hSTm] simp_rw [mk_preimage_prod_right_eq_if, measure_if, lintegral_indicator _ (measurableSet_toMeasurable _ _), lintegral_const, restrict_apply_univ, mul_comm] _ = μ s * ν t := by rw [measure_toMeasurable, measure_toMeasurable] · -- Formalization is based on https://mathoverflow.net/a/254134/136589 set ST := toMeasurable (μ.prod ν) (s ×ˢ t) have hSTm : MeasurableSet ST := measurableSet_toMeasurable _ _ have hST : s ×ˢ t ⊆ ST := subset_toMeasurable _ _ set f : α → ℝ≥0∞ := fun x => ν (Prod.mk x ⁻¹' ST) have hfm : Measurable f := measurable_measure_prod_mk_left hSTm set s' : Set α := { x \| ν t ≤ f x } have hss' : s ⊆ s' := fun x hx => measure_mono fun y hy => hST <\| mk_mem_prod hx hy calc μ s * ν t ≤ μ s' * ν t := by gcongr _ = ∫⁻ _ in s', ν t ∂μ := by rw [set_lintegral_const, mul_comm] _ ≤ ∫⁻ x in s', f x ∂μ := set_lintegral_mono measurable_const hfm fun x => id _ ≤ ∫⁻ x, f x ∂μ := lintegral_mono' restrict_le_self le_rfl _ = μ.prod ν ST := (prod_apply hSTm).symm _ = μ.prod ν (s ×ˢ t) := measure_toMeasurable _ #align measure_theory.measure.prod_prod MeasureTheory.Measure.prod_prod @[simp] lemma map_fst_prod : Measure.map Prod.fst (μ.prod ν) = (ν univ) • μ := by ext s hs simp [Measure.map_apply measurable_fst hs, ← prod_univ, mul_comm] @[simp] lemma map_snd_prod : Measure.map Prod.snd (μ.prod ν) = (μ univ) • ν := by ext s hs simp [Measure.map_apply measurable_snd hs, ← univ_prod] instance prod.instIsOpenPosMeasure {X Y : Type} [TopologicalSpace X] [TopologicalSpace Y] {m : MeasurableSpace X} {μ : Measure X} [IsOpenPosMeasure μ] {m' : MeasurableSpace Y} {ν : Measure Y} [IsOpenPosMeasure ν] [SFinite ν] : IsOpenPosMeasure (μ.prod ν) := by constructor rintro U U_open ⟨⟨x, y⟩, hxy⟩ rcases isOpen_prod_iff.1 U_open x y hxy with ⟨u, v, u_open, v_open, xu, yv, huv⟩ refine ne_of_gt (lt_of_lt_of_le ?_ (measure_mono huv)) simp only [prod_prod, CanonicallyOrderedCommSemiring.mul_pos] constructor · exact u_open.measure_pos μ ⟨x, xu⟩ · exact v_open.measure_pos ν ⟨y, yv⟩ #align measure_theory.measure.prod.is_open_pos_measure MeasureTheory.Measure.prod.instIsOpenPosMeasure instance {X Y : Type} [TopologicalSpace X] [MeasureSpace X] [IsOpenPosMeasure (volume : Measure X)] [TopologicalSpace Y] [MeasureSpace Y] [IsOpenPosMeasure (volume : Measure Y)] [SFinite (volume : Measure Y)] : IsOpenPosMeasure (volume : Measure (X × Y)) := prod.instIsOpenPosMeasure instance prod.instIsFiniteMeasure {α β : Type} {mα : MeasurableSpace α} {mβ : MeasurableSpace β} (μ : Measure α) (ν : Measure β) [IsFiniteMeasure μ] [IsFiniteMeasure ν] : IsFiniteMeasure (μ.prod ν) := by constructor rw [← univ_prod_univ, prod_prod] exact mul_lt_top (measure_lt_top _ _).ne (measure_lt_top _ _).ne #align measure_theory.measure.prod.measure_theory.is_finite_measure MeasureTheory.Measure.prod.instIsFiniteMeasure instance {α β : Type} [MeasureSpace α] [MeasureSpace β] [IsFiniteMeasure (volume : Measure α)] [IsFiniteMeasure (volume : Measure β)] : IsFiniteMeasure (volume : Measure (α × β)) := prod.instIsFiniteMeasure _ _ instance prod.instIsProbabilityMeasure {α β : Type} {mα : MeasurableSpace α} {mβ : MeasurableSpace β} (μ : Measure α) (ν : Measure β) [IsProbabilityMeasure μ] [IsProbabilityMeasure ν] : IsProbabilityMeasure (μ.prod ν) := ⟨by rw [← univ_prod_univ, prod_prod, measure_univ, measure_univ, mul_one]⟩ #align measure_theory.measure.prod.measure_theory.is_probability_measure MeasureTheory.Measure.prod.instIsProbabilityMeasure instance {α β : Type} [MeasureSpace α] [MeasureSpace β] [IsProbabilityMeasure (volume : Measure α)] [IsProbabilityMeasure (volume : Measure β)] : IsProbabilityMeasure (volume : Measure (α × β)) := prod.instIsProbabilityMeasure _ _ instance prod.instIsFiniteMeasureOnCompacts {α β : Type} [TopologicalSpace α] [TopologicalSpace β] {mα : MeasurableSpace α} {mβ : MeasurableSpace β} (μ : Measure α) (ν : Measure β) [IsFiniteMeasureOnCompacts μ] [IsFiniteMeasureOnCompacts ν] [SFinite ν] : IsFiniteMeasureOnCompacts (μ.prod ν) := by refine ⟨fun K hK => ?_⟩ set L := (Prod.fst '' K) ×ˢ (Prod.snd '' K) with hL have : K ⊆ L := by rintro ⟨x, y⟩ hxy simp only [L, prod_mk_mem_set_prod_eq, mem_image, Prod.exists, exists_and_right, exists_eq_right] exact ⟨⟨y, hxy⟩, ⟨x, hxy⟩⟩ apply lt_of_le_of_lt (measure_mono this) rw [hL, prod_prod] exact mul_lt_top (IsCompact.measure_lt_top (hK.image continuous_fst)).ne (IsCompact.measure_lt_top (hK.image continuous_snd)).ne #align measure_theory.measure.prod.measure_theory.is_finite_measure_on_compacts MeasureTheory.Measure.prod.instIsFiniteMeasureOnCompacts instance {X Y : Type} [TopologicalSpace X] [MeasureSpace X] [IsFiniteMeasureOnCompacts (volume : Measure X)] [TopologicalSpace Y] [MeasureSpace Y] [IsFiniteMeasureOnCompacts (volume : Measure Y)] [SFinite (volume : Measure Y)] : IsFiniteMeasureOnCompacts (volume : Measure (X × Y)) := prod.instIsFiniteMeasureOnCompacts _ _ instance prod.instNoAtoms_fst [NoAtoms μ] : NoAtoms (Measure.prod μ ν) := by refine NoAtoms.mk (fun x => ?_) rw [← Set.singleton_prod_singleton, Measure.prod_prod, measure_singleton, zero_mul] instance prod.instNoAtoms_snd [NoAtoms ν] : NoAtoms (Measure.prod μ ν) := by refine NoAtoms.mk (fun x => ?_) rw [← Set.singleton_prod_singleton, Measure.prod_prod, measure_singleton (μ := ν), mul_zero] theorem ae_measure_lt_top {s : Set (α × β)} (hs : MeasurableSet s) (h2s : (μ.prod ν) s ≠ ∞) : ∀ᵐ x ∂μ, ν (Prod.mk x ⁻¹' s) < ∞ := by rw [prod_apply hs] at h2s exact ae_lt_top (measurable_measure_prod_mk_left hs) h2s #align measure_theory.measure.ae_measure_lt_top MeasureTheory.Measure.ae_measure_lt_top	Mathlib/MeasureTheory/Constructions/Prod/Basic.lean	473	475	theorem measure_prod_null {s : Set (α × β)} (hs : MeasurableSet s) : μ.prod ν s = 0 ↔ (fun x => ν (Prod.mk x ⁻¹' s)) =ᵐ[μ] 0 := by	rw [prod_apply hs, lintegral_eq_zero_iff (measurable_measure_prod_mk_left hs)]
import Mathlib.Order.BoundedOrder import Mathlib.Order.MinMax import Mathlib.Algebra.NeZero import Mathlib.Algebra.Order.Monoid.Defs #align_import algebra.order.monoid.canonical.defs from "leanprover-community/mathlib"@"e8638a0fcaf73e4500469f368ef9494e495099b3" universe u variable {α : Type u} class ExistsMulOfLE (α : Type u) [Mul α] [LE α] : Prop where exists_mul_of_le : ∀ {a b : α}, a ≤ b → ∃ c : α, b = a * c #align has_exists_mul_of_le ExistsMulOfLE class ExistsAddOfLE (α : Type u) [Add α] [LE α] : Prop where exists_add_of_le : ∀ {a b : α}, a ≤ b → ∃ c : α, b = a + c #align has_exists_add_of_le ExistsAddOfLE attribute [to_additive] ExistsMulOfLE export ExistsMulOfLE (exists_mul_of_le) export ExistsAddOfLE (exists_add_of_le) -- See note [lower instance priority] @[to_additive] instance (priority := 100) Group.existsMulOfLE (α : Type u) [Group α] [LE α] : ExistsMulOfLE α := ⟨fun {a b} _ => ⟨a⁻¹ * b, (mul_inv_cancel_left _ _).symm⟩⟩ #align group.has_exists_mul_of_le Group.existsMulOfLE #align add_group.has_exists_add_of_le AddGroup.existsAddOfLE class CanonicallyOrderedAddCommMonoid (α : Type) extends OrderedAddCommMonoid α, OrderBot α where protected exists_add_of_le : ∀ {a b : α}, a ≤ b → ∃ c, b = a + c protected le_self_add : ∀ a b : α, a ≤ a + b #align canonically_ordered_add_monoid CanonicallyOrderedAddCommMonoid #align canonically_ordered_add_monoid.to_order_bot CanonicallyOrderedAddCommMonoid.toOrderBot -- see Note [lower instance priority] attribute [instance 100] CanonicallyOrderedAddCommMonoid.toOrderBot @[to_additive] class CanonicallyOrderedCommMonoid (α : Type) extends OrderedCommMonoid α, OrderBot α where protected exists_mul_of_le : ∀ {a b : α}, a ≤ b → ∃ c, b = a * c protected le_self_mul : ∀ a b : α, a ≤ a * b #align canonically_ordered_monoid CanonicallyOrderedAddCommMonoid #align canonically_ordered_monoid.to_order_bot CanonicallyOrderedCommMonoid.toOrderBot -- see Note [lower instance priority] attribute [instance 100] CanonicallyOrderedCommMonoid.toOrderBot -- see Note [lower instance priority] @[to_additive] instance (priority := 100) CanonicallyOrderedCommMonoid.existsMulOfLE (α : Type u) [h : CanonicallyOrderedCommMonoid α] : ExistsMulOfLE α := { h with } #align canonically_ordered_monoid.has_exists_mul_of_le CanonicallyOrderedCommMonoid.existsMulOfLE #align canonically_ordered_add_monoid.has_exists_add_of_le CanonicallyOrderedAddCommMonoid.existsAddOfLE section CanonicallyOrderedCommMonoid variable [CanonicallyOrderedCommMonoid α] {a b c d : α} @[to_additive] theorem le_self_mul : a ≤ a * c := CanonicallyOrderedCommMonoid.le_self_mul _ _ #align le_self_mul le_self_mul #align le_self_add le_self_add @[to_additive]	Mathlib/Algebra/Order/Monoid/Canonical/Defs.lean	148	150	theorem le_mul_self : a ≤ b * a := by	rw [mul_comm] exact le_self_mul
import Mathlib.NumberTheory.LegendreSymbol.QuadraticChar.Basic #align_import number_theory.legendre_symbol.basic from "leanprover-community/mathlib"@"5b2fe80501ff327b9109fb09b7cc8c325cd0d7d9" open Nat section Euler section Legendre open ZMod variable (p : ℕ) [Fact p.Prime] def legendreSym (a : ℤ) : ℤ := quadraticChar (ZMod p) a #align legendre_sym legendreSym namespace legendreSym theorem eq_pow (a : ℤ) : (legendreSym p a : ZMod p) = (a : ZMod p) ^ (p / 2) := by rcases eq_or_ne (ringChar (ZMod p)) 2 with hc \| hc · by_cases ha : (a : ZMod p) = 0 · rw [legendreSym, ha, quadraticChar_zero, zero_pow (Nat.div_pos (@Fact.out p.Prime).two_le (succ_pos 1)).ne'] norm_cast · have := (ringChar_zmod_n p).symm.trans hc -- p = 2 subst p rw [legendreSym, quadraticChar_eq_one_of_char_two hc ha] revert ha push_cast generalize (a : ZMod 2) = b; fin_cases b · tauto · simp · convert quadraticChar_eq_pow_of_char_ne_two' hc (a : ZMod p) exact (card p).symm #align legendre_sym.eq_pow legendreSym.eq_pow theorem eq_one_or_neg_one {a : ℤ} (ha : (a : ZMod p) ≠ 0) : legendreSym p a = 1 ∨ legendreSym p a = -1 := quadraticChar_dichotomy ha #align legendre_sym.eq_one_or_neg_one legendreSym.eq_one_or_neg_one theorem eq_neg_one_iff_not_one {a : ℤ} (ha : (a : ZMod p) ≠ 0) : legendreSym p a = -1 ↔ ¬legendreSym p a = 1 := quadraticChar_eq_neg_one_iff_not_one ha #align legendre_sym.eq_neg_one_iff_not_one legendreSym.eq_neg_one_iff_not_one theorem eq_zero_iff (a : ℤ) : legendreSym p a = 0 ↔ (a : ZMod p) = 0 := quadraticChar_eq_zero_iff #align legendre_sym.eq_zero_iff legendreSym.eq_zero_iff @[simp]	Mathlib/NumberTheory/LegendreSymbol/Basic.lean	152	152	theorem at_zero : legendreSym p 0 = 0 := by	rw [legendreSym, Int.cast_zero, MulChar.map_zero]
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 section Semiring variable (R) [Semiring R] def monomial (n : σ →₀ ℕ) : R →ₗ[R] MvPowerSeries σ R := letI := Classical.decEq σ LinearMap.stdBasis R (fun _ ↦ R) n #align mv_power_series.monomial MvPowerSeries.monomial def coeff (n : σ →₀ ℕ) : MvPowerSeries σ R →ₗ[R] R := LinearMap.proj n #align mv_power_series.coeff MvPowerSeries.coeff variable {R} @[ext] theorem ext {φ ψ} (h : ∀ n : σ →₀ ℕ, coeff R n φ = coeff R n ψ) : φ = ψ := funext h #align mv_power_series.ext MvPowerSeries.ext theorem ext_iff {φ ψ : MvPowerSeries σ R} : φ = ψ ↔ ∀ n : σ →₀ ℕ, coeff R n φ = coeff R n ψ := Function.funext_iff #align mv_power_series.ext_iff MvPowerSeries.ext_iff theorem monomial_def [DecidableEq σ] (n : σ →₀ ℕ) : (monomial R n) = LinearMap.stdBasis R (fun _ ↦ R) n := by rw [monomial] -- unify the `Decidable` arguments convert rfl #align mv_power_series.monomial_def MvPowerSeries.monomial_def theorem coeff_monomial [DecidableEq σ] (m n : σ →₀ ℕ) (a : R) : coeff R m (monomial R n a) = if m = n then a else 0 := by -- This used to be `rw`, but we need `erw` after leanprover/lean4#2644 erw [coeff, monomial_def, LinearMap.proj_apply (i := m)] dsimp only -- This used to be `rw`, but we need `erw` after leanprover/lean4#2644 erw [LinearMap.stdBasis_apply, Function.update_apply, Pi.zero_apply] #align mv_power_series.coeff_monomial MvPowerSeries.coeff_monomial @[simp] theorem coeff_monomial_same (n : σ →₀ ℕ) (a : R) : coeff R n (monomial R n a) = a := by classical rw [monomial_def] exact LinearMap.stdBasis_same R (fun _ ↦ R) n a #align mv_power_series.coeff_monomial_same MvPowerSeries.coeff_monomial_same theorem coeff_monomial_ne {m n : σ →₀ ℕ} (h : m ≠ n) (a : R) : coeff R m (monomial R n a) = 0 := by classical rw [monomial_def] exact LinearMap.stdBasis_ne R (fun _ ↦ R) _ _ h a #align mv_power_series.coeff_monomial_ne MvPowerSeries.coeff_monomial_ne theorem eq_of_coeff_monomial_ne_zero {m n : σ →₀ ℕ} {a : R} (h : coeff R m (monomial R n a) ≠ 0) : m = n := by_contra fun h' => h <\| coeff_monomial_ne h' a #align mv_power_series.eq_of_coeff_monomial_ne_zero MvPowerSeries.eq_of_coeff_monomial_ne_zero @[simp] theorem coeff_comp_monomial (n : σ →₀ ℕ) : (coeff R n).comp (monomial R n) = LinearMap.id := LinearMap.ext <\| coeff_monomial_same n #align mv_power_series.coeff_comp_monomial MvPowerSeries.coeff_comp_monomial -- Porting note (#10618): simp can prove this. -- @[simp] theorem coeff_zero (n : σ →₀ ℕ) : coeff R n (0 : MvPowerSeries σ R) = 0 := rfl #align mv_power_series.coeff_zero MvPowerSeries.coeff_zero variable (m n : σ →₀ ℕ) (φ ψ : MvPowerSeries σ R) instance : One (MvPowerSeries σ R) := ⟨monomial R (0 : σ →₀ ℕ) 1⟩ theorem coeff_one [DecidableEq σ] : coeff R n (1 : MvPowerSeries σ R) = if n = 0 then 1 else 0 := coeff_monomial _ _ _ #align mv_power_series.coeff_one MvPowerSeries.coeff_one theorem coeff_zero_one : coeff R (0 : σ →₀ ℕ) 1 = 1 := coeff_monomial_same 0 1 #align mv_power_series.coeff_zero_one MvPowerSeries.coeff_zero_one theorem monomial_zero_one : monomial R (0 : σ →₀ ℕ) 1 = 1 := rfl #align mv_power_series.monomial_zero_one MvPowerSeries.monomial_zero_one instance : AddMonoidWithOne (MvPowerSeries σ R) := { show AddMonoid (MvPowerSeries σ R) by infer_instance with natCast := fun n => monomial R 0 n natCast_zero := by simp [Nat.cast] natCast_succ := by simp [Nat.cast, monomial_zero_one] one := 1 } instance : Mul (MvPowerSeries σ R) := letI := Classical.decEq σ ⟨fun φ ψ n => ∑ p ∈ antidiagonal n, coeff R p.1 φ coeff R p.2 ψ⟩ theorem coeff_mul [DecidableEq σ] : coeff R n (φ * ψ) = ∑ p ∈ antidiagonal n, coeff R p.1 φ * coeff R p.2 ψ := by refine Finset.sum_congr ?_ fun _ _ => rfl rw [Subsingleton.elim (Classical.decEq σ) ‹DecidableEq σ›] #align mv_power_series.coeff_mul MvPowerSeries.coeff_mul protected theorem zero_mul : (0 : MvPowerSeries σ R) * φ = 0 := ext fun n => by classical simp [coeff_mul] #align mv_power_series.zero_mul MvPowerSeries.zero_mul protected theorem mul_zero : φ * 0 = 0 := ext fun n => by classical simp [coeff_mul] #align mv_power_series.mul_zero MvPowerSeries.mul_zero theorem coeff_monomial_mul (a : R) : coeff R m (monomial R n a * φ) = if n ≤ m then a * coeff R (m - n) φ else 0 := by classical have : ∀ p ∈ antidiagonal m, coeff R (p : (σ →₀ ℕ) × (σ →₀ ℕ)).1 (monomial R n a) * coeff R p.2 φ ≠ 0 → p.1 = n := fun p _ hp => eq_of_coeff_monomial_ne_zero (left_ne_zero_of_mul hp) rw [coeff_mul, ← Finset.sum_filter_of_ne this, Finset.filter_fst_eq_antidiagonal _ n, Finset.sum_ite_index] simp only [Finset.sum_singleton, coeff_monomial_same, Finset.sum_empty] #align mv_power_series.coeff_monomial_mul MvPowerSeries.coeff_monomial_mul	Mathlib/RingTheory/MvPowerSeries/Basic.lean	226	235	theorem coeff_mul_monomial (a : R) : coeff R m (φ * monomial R n a) = if n ≤ m then coeff R (m - n) φ * a else 0 := by	classical have : ∀ p ∈ antidiagonal m, coeff R (p : (σ →₀ ℕ) × (σ →₀ ℕ)).1 φ * coeff R p.2 (monomial R n a) ≠ 0 → p.2 = n := fun p _ hp => eq_of_coeff_monomial_ne_zero (right_ne_zero_of_mul hp) rw [coeff_mul, ← Finset.sum_filter_of_ne this, Finset.filter_snd_eq_antidiagonal _ n, Finset.sum_ite_index] simp only [Finset.sum_singleton, coeff_monomial_same, Finset.sum_empty]
import Mathlib.Logic.Function.Basic import Mathlib.Tactic.AdaptationNote #align_import data.subtype from "leanprover-community/mathlib"@"48fb5b5280e7c81672afc9524185ae994553ebf4" #align_import init.data.subtype.basic from "leanprover-community/lean"@"855e5b74e3a52a40552e8f067169d747d48743fd" open Function namespace Subtype variable {α β γ : Sort} {p q : α → Prop} #align subtype.eq Subtype.eq #align subtype.eta Subtype.eta #noalign subtype.tag_irrelevant #noalign subtype.exists_of_subtype #noalign subtype.inhabited attribute [coe] Subtype.val initialize_simps_projections Subtype (val → coe) theorem prop (x : Subtype p) : p x := x.2 #align subtype.prop Subtype.prop @[simp] protected theorem «forall» {q : { a // p a } → Prop} : (∀ x, q x) ↔ ∀ a b, q ⟨a, b⟩ := ⟨fun h a b ↦ h ⟨a, b⟩, fun h ⟨a, b⟩ ↦ h a b⟩ #align subtype.forall Subtype.forall protected theorem forall' {q : ∀ x, p x → Prop} : (∀ x h, q x h) ↔ ∀ x : { a // p a }, q x x.2 := (@Subtype.forall _ _ fun x ↦ q x.1 x.2).symm #align subtype.forall' Subtype.forall' @[simp] protected theorem «exists» {q : { a // p a } → Prop} : (∃ x, q x) ↔ ∃ a b, q ⟨a, b⟩ := ⟨fun ⟨⟨a, b⟩, h⟩ ↦ ⟨a, b, h⟩, fun ⟨a, b, h⟩ ↦ ⟨⟨a, b⟩, h⟩⟩ #align subtype.exists Subtype.exists protected theorem exists' {q : ∀ x, p x → Prop} : (∃ x h, q x h) ↔ ∃ x : { a // p a }, q x x.2 := (@Subtype.exists _ _ fun x ↦ q x.1 x.2).symm #align subtype.exists' Subtype.exists' @[ext] protected theorem ext : ∀ {a1 a2 : { x // p x }}, (a1 : α) = (a2 : α) → a1 = a2 \| ⟨_, _⟩, ⟨_, _⟩, rfl => rfl #align subtype.ext Subtype.ext theorem ext_iff {a1 a2 : { x // p x }} : a1 = a2 ↔ (a1 : α) = (a2 : α) := ⟨congr_arg _, Subtype.ext⟩ #align subtype.ext_iff Subtype.ext_iff theorem heq_iff_coe_eq (h : ∀ x, p x ↔ q x) {a1 : { x // p x }} {a2 : { x // q x }} : HEq a1 a2 ↔ (a1 : α) = (a2 : α) := Eq.rec (motive := fun (pp: (α → Prop)) _ ↦ ∀ a2' : {x // pp x}, HEq a1 a2' ↔ (a1 : α) = (a2' : α)) (fun _ ↦ heq_iff_eq.trans ext_iff) (funext <\| fun x ↦ propext (h x)) a2 #align subtype.heq_iff_coe_eq Subtype.heq_iff_coe_eq lemma heq_iff_coe_heq {α β : Sort _} {p : α → Prop} {q : β → Prop} {a : {x // p x}} {b : {y // q y}} (h : α = β) (h' : HEq p q) : HEq a b ↔ HEq (a : α) (b : β) := by subst h subst h' rw [heq_iff_eq, heq_iff_eq, ext_iff] #align subtype.heq_iff_coe_heq Subtype.heq_iff_coe_heq theorem ext_val {a1 a2 : { x // p x }} : a1.1 = a2.1 → a1 = a2 := Subtype.ext #align subtype.ext_val Subtype.ext_val theorem ext_iff_val {a1 a2 : { x // p x }} : a1 = a2 ↔ a1.1 = a2.1 := ext_iff #align subtype.ext_iff_val Subtype.ext_iff_val @[simp] theorem coe_eta (a : { a // p a }) (h : p a) : mk (↑a) h = a := Subtype.ext rfl #align subtype.coe_eta Subtype.coe_eta theorem coe_mk (a h) : (@mk α p a h : α) = a := rfl #align subtype.coe_mk Subtype.coe_mk -- Porting note: comment out `@[simp, nolint simp_nf]` -- Porting note: not clear if "built-in reduction doesn't always work" is still relevant -- built-in reduction doesn't always work -- @[simp, nolint simp_nf] theorem mk_eq_mk {a h a' h'} : @mk α p a h = @mk α p a' h' ↔ a = a' := ext_iff #align subtype.mk_eq_mk Subtype.mk_eq_mk theorem coe_eq_of_eq_mk {a : { a // p a }} {b : α} (h : ↑a = b) : a = ⟨b, h ▸ a.2⟩ := Subtype.ext h #align subtype.coe_eq_of_eq_mk Subtype.coe_eq_of_eq_mk theorem coe_eq_iff {a : { a // p a }} {b : α} : ↑a = b ↔ ∃ h, a = ⟨b, h⟩ := ⟨fun h ↦ h ▸ ⟨a.2, (coe_eta _ _).symm⟩, fun ⟨_, ha⟩ ↦ ha.symm ▸ rfl⟩ #align subtype.coe_eq_iff Subtype.coe_eq_iff theorem coe_injective : Injective (fun (a : Subtype p) ↦ (a : α)) := fun _ _ ↦ Subtype.ext #align subtype.coe_injective Subtype.coe_injective theorem val_injective : Injective (@val _ p) := coe_injective #align subtype.val_injective Subtype.val_injective theorem coe_inj {a b : Subtype p} : (a : α) = b ↔ a = b := coe_injective.eq_iff #align subtype.coe_inj Subtype.coe_inj theorem val_inj {a b : Subtype p} : a.val = b.val ↔ a = b := coe_inj #align subtype.val_inj Subtype.val_inj lemma coe_ne_coe {a b : Subtype p} : (a : α) ≠ b ↔ a ≠ b := coe_injective.ne_iff @[deprecated (since := "2024-04-04")] alias ⟨ne_of_val_ne, _⟩ := coe_ne_coe #align subtype.ne_of_val_ne Subtype.ne_of_val_ne -- Porting note: it is unclear why the linter doesn't like this. -- If you understand why, please replace this comment with an explanation, or resolve. @[simp, nolint simpNF] theorem _root_.exists_eq_subtype_mk_iff {a : Subtype p} {b : α} : (∃ h : p b, a = Subtype.mk b h) ↔ ↑a = b := coe_eq_iff.symm #align exists_eq_subtype_mk_iff exists_eq_subtype_mk_iff -- Porting note: it is unclear why the linter doesn't like this. -- If you understand why, please replace this comment with an explanation, or resolve. @[simp, nolint simpNF] theorem _root_.exists_subtype_mk_eq_iff {a : Subtype p} {b : α} : (∃ h : p b, Subtype.mk b h = a) ↔ b = a := by simp only [@eq_comm _ b, exists_eq_subtype_mk_iff, @eq_comm _ _ a] #align exists_subtype_mk_eq_iff exists_subtype_mk_eq_iff def restrict {α} {β : α → Type} (p : α → Prop) (f : ∀ x, β x) (x : Subtype p) : β x.1 := f x #align subtype.restrict Subtype.restrict theorem restrict_apply {α} {β : α → Type*} (f : ∀ x, β x) (p : α → Prop) (x : Subtype p) : restrict p f x = f x.1 := by rfl #align subtype.restrict_apply Subtype.restrict_apply theorem restrict_def {α β} (f : α → β) (p : α → Prop) : restrict p f = f ∘ (fun (a : Subtype p) ↦ a) := rfl #align subtype.restrict_def Subtype.restrict_def theorem restrict_injective {α β} {f : α → β} (p : α → Prop) (h : Injective f) : Injective (restrict p f) := h.comp coe_injective #align subtype.restrict_injective Subtype.restrict_injective	Mathlib/Data/Subtype.lean	183	188	theorem surjective_restrict {α} {β : α → Type*} [ne : ∀ a, Nonempty (β a)] (p : α → Prop) : Surjective fun f : ∀ x, β x ↦ restrict p f := by	letI := Classical.decPred p refine fun f ↦ ⟨fun x ↦ if h : p x then f ⟨x, h⟩ else Nonempty.some (ne x), funext <\| ?_⟩ rintro ⟨x, hx⟩ exact dif_pos hx
import Mathlib.CategoryTheory.Action import Mathlib.Combinatorics.Quiver.Arborescence import Mathlib.Combinatorics.Quiver.ConnectedComponent import Mathlib.GroupTheory.FreeGroup.IsFreeGroup #align_import group_theory.nielsen_schreier from "leanprover-community/mathlib"@"1bda4fc53de6ade5ab9da36f2192e24e2084a2ce" noncomputable section open scoped Classical universe v u open CategoryTheory CategoryTheory.ActionCategory CategoryTheory.SingleObj Quiver FreeGroup -- Porting note(#5171): @[nolint has_nonempty_instance] @[nolint unusedArguments] def IsFreeGroupoid.Generators (G) [Groupoid G] := G #align is_free_groupoid.generators IsFreeGroupoid.Generators class IsFreeGroupoid (G) [Groupoid.{v} G] where quiverGenerators : Quiver.{v + 1} (IsFreeGroupoid.Generators G) of : ∀ {a b : IsFreeGroupoid.Generators G}, (a ⟶ b) → ((show G from a) ⟶ b) unique_lift : ∀ {X : Type v} [Group X] (f : Labelling (IsFreeGroupoid.Generators G) X), ∃! F : G ⥤ CategoryTheory.SingleObj X, ∀ (a b) (g : a ⟶ b), F.map (of g) = f g #align is_free_groupoid IsFreeGroupoid attribute [nolint docBlame] IsFreeGroupoid.of IsFreeGroupoid.unique_lift namespace IsFreeGroupoid attribute [instance] quiverGenerators @[ext] theorem ext_functor {G} [Groupoid.{v} G] [IsFreeGroupoid G] {X : Type v} [Group X] (f g : G ⥤ CategoryTheory.SingleObj X) (h : ∀ (a b) (e : a ⟶ b), f.map (of e) = g.map (of e)) : f = g := let ⟨_, _, u⟩ := @unique_lift G _ _ X _ fun (a b : Generators G) (e : a ⟶ b) => g.map (of e) _root_.trans (u _ h) (u _ fun _ _ _ => rfl).symm #align is_free_groupoid.ext_functor IsFreeGroupoid.ext_functor instance actionGroupoidIsFree {G A : Type u} [Group G] [IsFreeGroup G] [MulAction G A] : IsFreeGroupoid (ActionCategory G A) where quiverGenerators := ⟨fun a b => { e : IsFreeGroup.Generators G // IsFreeGroup.of e • a.back = b.back }⟩ of := fun (e : { e // _}) => ⟨IsFreeGroup.of e, e.property⟩ unique_lift := by intro X _ f let f' : IsFreeGroup.Generators G → (A → X) ⋊[mulAutArrow] G := fun e => ⟨fun b => @f ⟨(), _⟩ ⟨(), b⟩ ⟨e, smul_inv_smul _ b⟩, IsFreeGroup.of e⟩ rcases IsFreeGroup.unique_lift f' with ⟨F', hF', uF'⟩ refine ⟨uncurry F' ?_, ?_, ?_⟩ · suffices SemidirectProduct.rightHom.comp F' = MonoidHom.id _ by -- Porting note: `MonoidHom.ext_iff` has been deprecated. exact DFunLike.ext_iff.mp this apply IsFreeGroup.ext_hom (fun x ↦ ?_) rw [MonoidHom.comp_apply, hF'] rfl · rintro ⟨⟨⟩, a : A⟩ ⟨⟨⟩, b⟩ ⟨e, h : IsFreeGroup.of e • a = b⟩ change (F' (IsFreeGroup.of _)).left _ = _ rw [hF'] cases inv_smul_eq_iff.mpr h.symm rfl · intro E hE have : curry E = F' := by apply uF' intro e ext · convert hE _ _ _ rfl · rfl apply Functor.hext · intro apply Unit.ext · refine ActionCategory.cases ?_ intros simp only [← this, uncurry_map, curry_apply_left, coe_back, homOfPair.val] rfl #align is_free_groupoid.action_groupoid_is_free IsFreeGroupoid.actionGroupoidIsFree namespace SpanningTree variable {G : Type u} [Groupoid.{u} G] [IsFreeGroupoid G] (T : WideSubquiver (Symmetrify <\| Generators G)) [Arborescence T] private def root' : G := show T from root T -- #align is_free_groupoid.spanning_tree.root' IsFreeGroupoid.SpanningTree.root' -- this has to be marked noncomputable, see issue #451. -- It might be nicer to define this in terms of `composePath` -- Porting note: removed noncomputable. This is already declared at the beginning of the section. def homOfPath : ∀ {a : G}, Path (root T) a → (root' T ⟶ a) \| _, Path.nil => 𝟙 _ \| _, Path.cons p f => homOfPath p ≫ Sum.recOn f.val (fun e => of e) fun e => inv (of e) #align is_free_groupoid.spanning_tree.hom_of_path IsFreeGroupoid.SpanningTree.homOfPath def treeHom (a : G) : root' T ⟶ a := homOfPath T default #align is_free_groupoid.spanning_tree.tree_hom IsFreeGroupoid.SpanningTree.treeHom theorem treeHom_eq {a : G} (p : Path (root T) a) : treeHom T a = homOfPath T p := by rw [treeHom, Unique.default_eq] #align is_free_groupoid.spanning_tree.tree_hom_eq IsFreeGroupoid.SpanningTree.treeHom_eq @[simp] theorem treeHom_root : treeHom T (root' T) = 𝟙 _ := -- this should just be `treeHom_eq T Path.nil`, but Lean treats `homOfPath` with suspicion. _root_.trans (treeHom_eq T Path.nil) rfl #align is_free_groupoid.spanning_tree.tree_hom_root IsFreeGroupoid.SpanningTree.treeHom_root def loopOfHom {a b : G} (p : a ⟶ b) : End (root' T) := treeHom T a ≫ p ≫ inv (treeHom T b) #align is_free_groupoid.spanning_tree.loop_of_hom IsFreeGroupoid.SpanningTree.loopOfHom	Mathlib/GroupTheory/FreeGroup/NielsenSchreier.lean	195	202	theorem loopOfHom_eq_id {a b : Generators G} (e) (H : e ∈ wideSubquiverSymmetrify T a b) : loopOfHom T (of e) = 𝟙 (root' T) := by	rw [loopOfHom, ← Category.assoc, IsIso.comp_inv_eq, Category.id_comp] cases' H with H H · rw [treeHom_eq T (Path.cons default ⟨Sum.inl e, H⟩), homOfPath] rfl · rw [treeHom_eq T (Path.cons default ⟨Sum.inr e, H⟩), homOfPath] simp only [IsIso.inv_hom_id, Category.comp_id, Category.assoc, treeHom]
import Mathlib.Analysis.Complex.Circle import Mathlib.Analysis.SpecialFunctions.Complex.Log #align_import analysis.special_functions.complex.circle from "leanprover-community/mathlib"@"f333194f5ecd1482191452c5ea60b37d4d6afa08" open Complex Function Set open Real	Mathlib/Analysis/SpecialFunctions/Complex/Circle.lean	37	38	theorem arg_expMapCircle {x : ℝ} (h₁ : -π < x) (h₂ : x ≤ π) : arg (expMapCircle x) = x := by	rw [expMapCircle_apply, exp_mul_I, arg_cos_add_sin_mul_I ⟨h₁, h₂⟩]
import Mathlib.Algebra.BigOperators.Module import Mathlib.Algebra.Order.Field.Basic import Mathlib.Order.Filter.ModEq import Mathlib.Analysis.Asymptotics.Asymptotics import Mathlib.Analysis.SpecificLimits.Basic import Mathlib.Data.List.TFAE import Mathlib.Analysis.NormedSpace.Basic #align_import analysis.specific_limits.normed from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" noncomputable section open scoped Classical open Set Function Filter Finset Metric Asymptotics open scoped Classical open Topology Nat uniformity NNReal ENNReal variable {α : Type} {β : Type} {ι : Type} theorem tendsto_norm_atTop_atTop : Tendsto (norm : ℝ → ℝ) atTop atTop := tendsto_abs_atTop_atTop #align tendsto_norm_at_top_at_top tendsto_norm_atTop_atTop theorem summable_of_absolute_convergence_real {f : ℕ → ℝ} : (∃ r, Tendsto (fun n ↦ ∑ i ∈ range n, \|f i\|) atTop (𝓝 r)) → Summable f \| ⟨r, hr⟩ => by refine .of_norm ⟨r, (hasSum_iff_tendsto_nat_of_nonneg ?_ _).2 ?_⟩ · exact fun i ↦ norm_nonneg _ · simpa only using hr #align summable_of_absolute_convergence_real summable_of_absolute_convergence_real theorem tendsto_norm_zero' {𝕜 : Type} [NormedAddCommGroup 𝕜] : Tendsto (norm : 𝕜 → ℝ) (𝓝[≠] 0) (𝓝[>] 0) := tendsto_norm_zero.inf <\| tendsto_principal_principal.2 fun _ hx ↦ norm_pos_iff.2 hx #align tendsto_norm_zero' tendsto_norm_zero' theorem isLittleO_pow_pow_of_lt_left {r₁ r₂ : ℝ} (h₁ : 0 ≤ r₁) (h₂ : r₁ < r₂) : (fun n : ℕ ↦ r₁ ^ n) =o[atTop] fun n ↦ r₂ ^ n := have H : 0 < r₂ := h₁.trans_lt h₂ (isLittleO_of_tendsto fun _ hn ↦ False.elim <\| H.ne' <\| pow_eq_zero hn) <\| (tendsto_pow_atTop_nhds_zero_of_lt_one (div_nonneg h₁ (h₁.trans h₂.le)) ((div_lt_one H).2 h₂)).congr fun _ ↦ div_pow _ _ _ #align is_o_pow_pow_of_lt_left isLittleO_pow_pow_of_lt_left theorem isBigO_pow_pow_of_le_left {r₁ r₂ : ℝ} (h₁ : 0 ≤ r₁) (h₂ : r₁ ≤ r₂) : (fun n : ℕ ↦ r₁ ^ n) =O[atTop] fun n ↦ r₂ ^ n := h₂.eq_or_lt.elim (fun h ↦ h ▸ isBigO_refl _ _) fun h ↦ (isLittleO_pow_pow_of_lt_left h₁ h).isBigO set_option linter.uppercaseLean3 false in #align is_O_pow_pow_of_le_left isBigO_pow_pow_of_le_left theorem isLittleO_pow_pow_of_abs_lt_left {r₁ r₂ : ℝ} (h : \|r₁\| < \|r₂\|) : (fun n : ℕ ↦ r₁ ^ n) =o[atTop] fun n ↦ r₂ ^ n := by refine (IsLittleO.of_norm_left ?_).of_norm_right exact (isLittleO_pow_pow_of_lt_left (abs_nonneg r₁) h).congr (pow_abs r₁) (pow_abs r₂) #align is_o_pow_pow_of_abs_lt_left isLittleO_pow_pow_of_abs_lt_left open List in theorem TFAE_exists_lt_isLittleO_pow (f : ℕ → ℝ) (R : ℝ) : TFAE [∃ a ∈ Ioo (-R) R, f =o[atTop] (a ^ ·), ∃ a ∈ Ioo 0 R, f =o[atTop] (a ^ ·), ∃ a ∈ Ioo (-R) R, f =O[atTop] (a ^ ·), ∃ a ∈ Ioo 0 R, f =O[atTop] (a ^ ·), ∃ a < R, ∃ C : ℝ, (0 < C ∨ 0 < R) ∧ ∀ n, \|f n\| ≤ C * a ^ n, ∃ a ∈ Ioo 0 R, ∃ C > 0, ∀ n, \|f n\| ≤ C * a ^ n, ∃ a < R, ∀ᶠ n in atTop, \|f n\| ≤ a ^ n, ∃ a ∈ Ioo 0 R, ∀ᶠ n in atTop, \|f n\| ≤ a ^ n] := by have A : Ico 0 R ⊆ Ioo (-R) R := fun x hx ↦ ⟨(neg_lt_zero.2 (hx.1.trans_lt hx.2)).trans_le hx.1, hx.2⟩ have B : Ioo 0 R ⊆ Ioo (-R) R := Subset.trans Ioo_subset_Ico_self A -- First we prove that 1-4 are equivalent using 2 → 3 → 4, 1 → 3, and 2 → 1 tfae_have 1 → 3 · exact fun ⟨a, ha, H⟩ ↦ ⟨a, ha, H.isBigO⟩ tfae_have 2 → 1 · exact fun ⟨a, ha, H⟩ ↦ ⟨a, B ha, H⟩ tfae_have 3 → 2 · rintro ⟨a, ha, H⟩ rcases exists_between (abs_lt.2 ha) with ⟨b, hab, hbR⟩ exact ⟨b, ⟨(abs_nonneg a).trans_lt hab, hbR⟩, H.trans_isLittleO (isLittleO_pow_pow_of_abs_lt_left (hab.trans_le (le_abs_self b)))⟩ tfae_have 2 → 4 · exact fun ⟨a, ha, H⟩ ↦ ⟨a, ha, H.isBigO⟩ tfae_have 4 → 3 · exact fun ⟨a, ha, H⟩ ↦ ⟨a, B ha, H⟩ -- Add 5 and 6 using 4 → 6 → 5 → 3 tfae_have 4 → 6 · rintro ⟨a, ha, H⟩ rcases bound_of_isBigO_nat_atTop H with ⟨C, hC₀, hC⟩ refine ⟨a, ha, C, hC₀, fun n ↦ ?_⟩ simpa only [Real.norm_eq_abs, abs_pow, abs_of_nonneg ha.1.le] using hC (pow_ne_zero n ha.1.ne') tfae_have 6 → 5 · exact fun ⟨a, ha, C, H₀, H⟩ ↦ ⟨a, ha.2, C, Or.inl H₀, H⟩ tfae_have 5 → 3 · rintro ⟨a, ha, C, h₀, H⟩ rcases sign_cases_of_C_mul_pow_nonneg fun n ↦ (abs_nonneg _).trans (H n) with (rfl \| ⟨hC₀, ha₀⟩) · obtain rfl : f = 0 := by ext n simpa using H n simp only [lt_irrefl, false_or_iff] at h₀ exact ⟨0, ⟨neg_lt_zero.2 h₀, h₀⟩, isBigO_zero _ _⟩ exact ⟨a, A ⟨ha₀, ha⟩, isBigO_of_le' _ fun n ↦ (H n).trans <\| mul_le_mul_of_nonneg_left (le_abs_self _) hC₀.le⟩ -- Add 7 and 8 using 2 → 8 → 7 → 3 tfae_have 2 → 8 · rintro ⟨a, ha, H⟩ refine ⟨a, ha, (H.def zero_lt_one).mono fun n hn ↦ ?_⟩ rwa [Real.norm_eq_abs, Real.norm_eq_abs, one_mul, abs_pow, abs_of_pos ha.1] at hn tfae_have 8 → 7 · exact fun ⟨a, ha, H⟩ ↦ ⟨a, ha.2, H⟩ tfae_have 7 → 3 · rintro ⟨a, ha, H⟩ have : 0 ≤ a := nonneg_of_eventually_pow_nonneg (H.mono fun n ↦ (abs_nonneg _).trans) refine ⟨a, A ⟨this, ha⟩, IsBigO.of_bound 1 ?_⟩ simpa only [Real.norm_eq_abs, one_mul, abs_pow, abs_of_nonneg this] -- Porting note: used to work without explicitly having 6 → 7 tfae_have 6 → 7 · exact fun h ↦ tfae_8_to_7 <\| tfae_2_to_8 <\| tfae_3_to_2 <\| tfae_5_to_3 <\| tfae_6_to_5 h tfae_finish #align tfae_exists_lt_is_o_pow TFAE_exists_lt_isLittleO_pow theorem isLittleO_pow_const_const_pow_of_one_lt {R : Type} [NormedRing R] (k : ℕ) {r : ℝ} (hr : 1 < r) : (fun n ↦ (n : R) ^ k : ℕ → R) =o[atTop] fun n ↦ r ^ n := by have : Tendsto (fun x : ℝ ↦ x ^ k) (𝓝[>] 1) (𝓝 1) := ((continuous_id.pow k).tendsto' (1 : ℝ) 1 (one_pow _)).mono_left inf_le_left obtain ⟨r' : ℝ, hr' : r' ^ k < r, h1 : 1 < r'⟩ := ((this.eventually (gt_mem_nhds hr)).and self_mem_nhdsWithin).exists have h0 : 0 ≤ r' := zero_le_one.trans h1.le suffices (fun n ↦ (n : R) ^ k : ℕ → R) =O[atTop] fun n : ℕ ↦ (r' ^ k) ^ n from this.trans_isLittleO (isLittleO_pow_pow_of_lt_left (pow_nonneg h0 _) hr') conv in (r' ^ _) ^ _ => rw [← pow_mul, mul_comm, pow_mul] suffices ∀ n : ℕ, ‖(n : R)‖ ≤ (r' - 1)⁻¹ ‖(1 : R)‖ * ‖r' ^ n‖ from (isBigO_of_le' _ this).pow _ intro n rw [mul_right_comm] refine n.norm_cast_le.trans (mul_le_mul_of_nonneg_right ?_ (norm_nonneg _)) simpa [_root_.div_eq_inv_mul, Real.norm_eq_abs, abs_of_nonneg h0] using n.cast_le_pow_div_sub h1 #align is_o_pow_const_const_pow_of_one_lt isLittleO_pow_const_const_pow_of_one_lt theorem isLittleO_coe_const_pow_of_one_lt {R : Type} [NormedRing R] {r : ℝ} (hr : 1 < r) : ((↑) : ℕ → R) =o[atTop] fun n ↦ r ^ n := by simpa only [pow_one] using @isLittleO_pow_const_const_pow_of_one_lt R _ 1 _ hr #align is_o_coe_const_pow_of_one_lt isLittleO_coe_const_pow_of_one_lt theorem isLittleO_pow_const_mul_const_pow_const_pow_of_norm_lt {R : Type} [NormedRing R] (k : ℕ) {r₁ : R} {r₂ : ℝ} (h : ‖r₁‖ < r₂) : (fun n ↦ (n : R) ^ k * r₁ ^ n : ℕ → R) =o[atTop] fun n ↦ r₂ ^ n := by by_cases h0 : r₁ = 0 · refine (isLittleO_zero _ _).congr' (mem_atTop_sets.2 <\| ⟨1, fun n hn ↦ ?_⟩) EventuallyEq.rfl simp [zero_pow (one_le_iff_ne_zero.1 hn), h0] rw [← Ne, ← norm_pos_iff] at h0 have A : (fun n ↦ (n : R) ^ k : ℕ → R) =o[atTop] fun n ↦ (r₂ / ‖r₁‖) ^ n := isLittleO_pow_const_const_pow_of_one_lt k ((one_lt_div h0).2 h) suffices (fun n ↦ r₁ ^ n) =O[atTop] fun n ↦ ‖r₁‖ ^ n by simpa [div_mul_cancel₀ _ (pow_pos h0 _).ne'] using A.mul_isBigO this exact IsBigO.of_bound 1 (by simpa using eventually_norm_pow_le r₁) #align is_o_pow_const_mul_const_pow_const_pow_of_norm_lt isLittleO_pow_const_mul_const_pow_const_pow_of_norm_lt theorem tendsto_pow_const_div_const_pow_of_one_lt (k : ℕ) {r : ℝ} (hr : 1 < r) : Tendsto (fun n ↦ (n : ℝ) ^ k / r ^ n : ℕ → ℝ) atTop (𝓝 0) := (isLittleO_pow_const_const_pow_of_one_lt k hr).tendsto_div_nhds_zero #align tendsto_pow_const_div_const_pow_of_one_lt tendsto_pow_const_div_const_pow_of_one_lt theorem tendsto_pow_const_mul_const_pow_of_abs_lt_one (k : ℕ) {r : ℝ} (hr : \|r\| < 1) : Tendsto (fun n ↦ (n : ℝ) ^ k * r ^ n : ℕ → ℝ) atTop (𝓝 0) := by by_cases h0 : r = 0 · exact tendsto_const_nhds.congr' (mem_atTop_sets.2 ⟨1, fun n hn ↦ by simp [zero_lt_one.trans_le hn \|>.ne', h0]⟩) have hr' : 1 < \|r\|⁻¹ := one_lt_inv (abs_pos.2 h0) hr rw [tendsto_zero_iff_norm_tendsto_zero] simpa [div_eq_mul_inv] using tendsto_pow_const_div_const_pow_of_one_lt k hr' #align tendsto_pow_const_mul_const_pow_of_abs_lt_one tendsto_pow_const_mul_const_pow_of_abs_lt_one theorem tendsto_pow_const_mul_const_pow_of_lt_one (k : ℕ) {r : ℝ} (hr : 0 ≤ r) (h'r : r < 1) : Tendsto (fun n ↦ (n : ℝ) ^ k * r ^ n : ℕ → ℝ) atTop (𝓝 0) := tendsto_pow_const_mul_const_pow_of_abs_lt_one k (abs_lt.2 ⟨neg_one_lt_zero.trans_le hr, h'r⟩) #align tendsto_pow_const_mul_const_pow_of_lt_one tendsto_pow_const_mul_const_pow_of_lt_one theorem tendsto_self_mul_const_pow_of_abs_lt_one {r : ℝ} (hr : \|r\| < 1) : Tendsto (fun n ↦ n * r ^ n : ℕ → ℝ) atTop (𝓝 0) := by simpa only [pow_one] using tendsto_pow_const_mul_const_pow_of_abs_lt_one 1 hr #align tendsto_self_mul_const_pow_of_abs_lt_one tendsto_self_mul_const_pow_of_abs_lt_one theorem tendsto_self_mul_const_pow_of_lt_one {r : ℝ} (hr : 0 ≤ r) (h'r : r < 1) : Tendsto (fun n ↦ n * r ^ n : ℕ → ℝ) atTop (𝓝 0) := by simpa only [pow_one] using tendsto_pow_const_mul_const_pow_of_lt_one 1 hr h'r #align tendsto_self_mul_const_pow_of_lt_one tendsto_self_mul_const_pow_of_lt_one theorem tendsto_pow_atTop_nhds_zero_of_norm_lt_one {R : Type*} [NormedRing R] {x : R} (h : ‖x‖ < 1) : Tendsto (fun n : ℕ ↦ x ^ n) atTop (𝓝 0) := by apply squeeze_zero_norm' (eventually_norm_pow_le x) exact tendsto_pow_atTop_nhds_zero_of_lt_one (norm_nonneg _) h #align tendsto_pow_at_top_nhds_0_of_norm_lt_1 tendsto_pow_atTop_nhds_zero_of_norm_lt_one @[deprecated (since := "2024-01-31")] alias tendsto_pow_atTop_nhds_0_of_norm_lt_1 := tendsto_pow_atTop_nhds_zero_of_norm_lt_one theorem tendsto_pow_atTop_nhds_zero_of_abs_lt_one {r : ℝ} (h : \|r\| < 1) : Tendsto (fun n : ℕ ↦ r ^ n) atTop (𝓝 0) := tendsto_pow_atTop_nhds_zero_of_norm_lt_one h #align tendsto_pow_at_top_nhds_0_of_abs_lt_1 tendsto_pow_atTop_nhds_zero_of_abs_lt_one @[deprecated (since := "2024-01-31")] alias tendsto_pow_atTop_nhds_0_of_abs_lt_1 := tendsto_pow_atTop_nhds_zero_of_abs_lt_one	Mathlib/Analysis/SpecificLimits/Normed.lean	574	592	theorem summable_of_ratio_norm_eventually_le {α : Type} [SeminormedAddCommGroup α] [CompleteSpace α] {f : ℕ → α} {r : ℝ} (hr₁ : r < 1) (h : ∀ᶠ n in atTop, ‖f (n + 1)‖ ≤ r ‖f n‖) : Summable f := by	by_cases hr₀ : 0 ≤ r · rw [eventually_atTop] at h rcases h with ⟨N, hN⟩ rw [← @summable_nat_add_iff α _ _ _ _ N] refine .of_norm_bounded (fun n ↦ ‖f N‖ * r ^ n) (Summable.mul_left _ <\| summable_geometric_of_lt_one hr₀ hr₁) fun n ↦ ?_ simp only conv_rhs => rw [mul_comm, ← zero_add N] refine le_geom (u := fun n ↦ ‖f (n + N)‖) hr₀ n fun i _ ↦ ?_ convert hN (i + N) (N.le_add_left i) using 3 ac_rfl · push_neg at hr₀ refine .of_norm_bounded_eventually_nat 0 summable_zero ?_ filter_upwards [h] with _ hn by_contra! h exact not_lt.mpr (norm_nonneg _) (lt_of_le_of_lt hn <\| mul_neg_of_neg_of_pos hr₀ h)
import Mathlib.Control.Applicative import Mathlib.Control.Traversable.Basic import Mathlib.Data.List.Forall2 import Mathlib.Data.Set.Functor #align_import control.traversable.instances from "leanprover-community/mathlib"@"18a5306c091183ac90884daa9373fa3b178e8607" universe u v section Option open Functor variable {F G : Type u → Type u} variable [Applicative F] [Applicative G] variable [LawfulApplicative F] [LawfulApplicative G] theorem Option.id_traverse {α} (x : Option α) : Option.traverse (pure : α → Id α) x = x := by cases x <;> rfl #align option.id_traverse Option.id_traverse theorem Option.comp_traverse {α β γ} (f : β → F γ) (g : α → G β) (x : Option α) : Option.traverse (Comp.mk ∘ (f <$> ·) ∘ g) x = Comp.mk (Option.traverse f <$> Option.traverse g x) := by cases x <;> simp! [functor_norm] <;> rfl #align option.comp_traverse Option.comp_traverse theorem Option.traverse_eq_map_id {α β} (f : α → β) (x : Option α) : Option.traverse ((pure : _ → Id _) ∘ f) x = (pure : _ → Id _) (f <$> x) := by cases x <;> rfl #align option.traverse_eq_map_id Option.traverse_eq_map_id variable (η : ApplicativeTransformation F G)	Mathlib/Control/Traversable/Instances.lean	47	51	theorem Option.naturality {α β} (f : α → F β) (x : Option α) : η (Option.traverse f x) = Option.traverse (@η _ ∘ f) x := by	-- Porting note: added `ApplicativeTransformation` theorems cases' x with x <;> simp! [*, functor_norm, ApplicativeTransformation.preserves_map, ApplicativeTransformation.preserves_seq, ApplicativeTransformation.preserves_pure]
import Mathlib.RingTheory.FiniteType import Mathlib.RingTheory.Localization.AtPrime import Mathlib.RingTheory.Localization.Away.Basic import Mathlib.RingTheory.Localization.Integer import Mathlib.RingTheory.Localization.Submodule import Mathlib.RingTheory.Nilpotent.Lemmas import Mathlib.RingTheory.RingHomProperties import Mathlib.Data.Set.Subsingleton #align_import ring_theory.local_properties from "leanprover-community/mathlib"@"a7c017d750512a352b623b1824d75da5998457d0" open scoped Pointwise Classical universe u variable {R S : Type u} [CommRing R] [CommRing S] (M : Submonoid R) variable (N : Submonoid S) (R' S' : Type u) [CommRing R'] [CommRing S'] (f : R →+* S) variable [Algebra R R'] [Algebra S S'] section Properties section Ideal open scoped nonZeroDivisors theorem Ideal.le_of_localization_maximal {I J : Ideal R} (h : ∀ (P : Ideal R) (hP : P.IsMaximal), Ideal.map (algebraMap R (Localization.AtPrime P)) I ≤ Ideal.map (algebraMap R (Localization.AtPrime P)) J) : I ≤ J := by intro x hx suffices J.colon (Ideal.span {x}) = ⊤ by simpa using Submodule.mem_colon.mp (show (1 : R) ∈ J.colon (Ideal.span {x}) from this.symm ▸ Submodule.mem_top) x (Ideal.mem_span_singleton_self x) refine Not.imp_symm (J.colon (Ideal.span {x})).exists_le_maximal ?_ push_neg intro P hP le obtain ⟨⟨⟨a, ha⟩, ⟨s, hs⟩⟩, eq⟩ := (IsLocalization.mem_map_algebraMap_iff P.primeCompl _).mp (h P hP (Ideal.mem_map_of_mem _ hx)) rw [← _root_.map_mul, ← sub_eq_zero, ← map_sub] at eq obtain ⟨⟨m, hm⟩, eq⟩ := (IsLocalization.map_eq_zero_iff P.primeCompl _ _).mp eq refine hs ((hP.isPrime.mem_or_mem (le (Ideal.mem_colon_singleton.mpr ?_))).resolve_right hm) simp only [Subtype.coe_mk, mul_sub, sub_eq_zero, mul_comm x s, mul_left_comm] at eq simpa only [mul_assoc, eq] using J.mul_mem_left m ha #align ideal.le_of_localization_maximal Ideal.le_of_localization_maximal theorem Ideal.eq_of_localization_maximal {I J : Ideal R} (h : ∀ (P : Ideal R) (_ : P.IsMaximal), Ideal.map (algebraMap R (Localization.AtPrime P)) I = Ideal.map (algebraMap R (Localization.AtPrime P)) J) : I = J := le_antisymm (Ideal.le_of_localization_maximal fun P hP => (h P hP).le) (Ideal.le_of_localization_maximal fun P hP => (h P hP).ge) #align ideal.eq_of_localization_maximal Ideal.eq_of_localization_maximal theorem ideal_eq_bot_of_localization' (I : Ideal R) (h : ∀ (J : Ideal R) (hJ : J.IsMaximal), Ideal.map (algebraMap R (Localization.AtPrime J)) I = ⊥) : I = ⊥ := Ideal.eq_of_localization_maximal fun P hP => by simpa using h P hP #align ideal_eq_bot_of_localization' ideal_eq_bot_of_localization' -- TODO: This proof should work for all modules, once we have enough material on submodules of -- localized modules. theorem ideal_eq_bot_of_localization (I : Ideal R) (h : ∀ (J : Ideal R) (hJ : J.IsMaximal), IsLocalization.coeSubmodule (Localization.AtPrime J) I = ⊥) : I = ⊥ := ideal_eq_bot_of_localization' _ fun P hP => (Ideal.map_eq_bot_iff_le_ker _).mpr fun x hx => by rw [RingHom.mem_ker, ← Submodule.mem_bot R, ← h P hP, IsLocalization.mem_coeSubmodule] exact ⟨x, hx, rfl⟩ #align ideal_eq_bot_of_localization ideal_eq_bot_of_localization	Mathlib/RingTheory/LocalProperties.lean	290	300	theorem eq_zero_of_localization (r : R) (h : ∀ (J : Ideal R) (hJ : J.IsMaximal), algebraMap R (Localization.AtPrime J) r = 0) : r = 0 := by	rw [← Ideal.span_singleton_eq_bot] apply ideal_eq_bot_of_localization intro J hJ delta IsLocalization.coeSubmodule erw [Submodule.map_span, Submodule.span_eq_bot] rintro _ ⟨_, h', rfl⟩ cases Set.mem_singleton_iff.mpr h' exact h J hJ
import Mathlib.Algebra.Polynomial.Module.Basic import Mathlib.Algebra.Ring.Idempotents import Mathlib.RingTheory.Ideal.LocalRing import Mathlib.RingTheory.Noetherian import Mathlib.RingTheory.ReesAlgebra import Mathlib.RingTheory.Finiteness import Mathlib.Order.Basic import Mathlib.Order.Hom.Lattice #align_import ring_theory.filtration from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a" universe u v variable {R M : Type u} [CommRing R] [AddCommGroup M] [Module R M] (I : Ideal R) open Polynomial open scoped Polynomial @[ext] structure Ideal.Filtration (M : Type u) [AddCommGroup M] [Module R M] where N : ℕ → Submodule R M mono : ∀ i, N (i + 1) ≤ N i smul_le : ∀ i, I • N i ≤ N (i + 1) #align ideal.filtration Ideal.Filtration variable (F F' : I.Filtration M) {I} namespace Ideal.Filtration theorem pow_smul_le (i j : ℕ) : I ^ i • F.N j ≤ F.N (i + j) := by induction' i with _ ih · simp · rw [pow_succ', mul_smul, add_assoc, add_comm 1, ← add_assoc] exact (smul_mono_right _ ih).trans (F.smul_le _) #align ideal.filtration.pow_smul_le Ideal.Filtration.pow_smul_le theorem pow_smul_le_pow_smul (i j k : ℕ) : I ^ (i + k) • F.N j ≤ I ^ k • F.N (i + j) := by rw [add_comm, pow_add, mul_smul] exact smul_mono_right _ (F.pow_smul_le i j) #align ideal.filtration.pow_smul_le_pow_smul Ideal.Filtration.pow_smul_le_pow_smul protected theorem antitone : Antitone F.N := antitone_nat_of_succ_le F.mono #align ideal.filtration.antitone Ideal.Filtration.antitone @[simps] def _root_.Ideal.trivialFiltration (I : Ideal R) (N : Submodule R M) : I.Filtration M where N _ := N mono _ := le_rfl smul_le _ := Submodule.smul_le_right #align ideal.trivial_filtration Ideal.trivialFiltration instance : Sup (I.Filtration M) := ⟨fun F F' => ⟨F.N ⊔ F'.N, fun i => sup_le_sup (F.mono i) (F'.mono i), fun i => (Submodule.smul_sup _ _ _).trans_le <\| sup_le_sup (F.smul_le i) (F'.smul_le i)⟩⟩ instance : SupSet (I.Filtration M) := ⟨fun S => { N := sSup (Ideal.Filtration.N '' S) mono := fun i => by apply sSup_le_sSup_of_forall_exists_le _ rintro _ ⟨⟨_, F, hF, rfl⟩, rfl⟩ exact ⟨_, ⟨⟨_, F, hF, rfl⟩, rfl⟩, F.mono i⟩ smul_le := fun i => by rw [sSup_eq_iSup', iSup_apply, Submodule.smul_iSup, iSup_apply] apply iSup_mono _ rintro ⟨_, F, hF, rfl⟩ exact F.smul_le i }⟩ instance : Inf (I.Filtration M) := ⟨fun F F' => ⟨F.N ⊓ F'.N, fun i => inf_le_inf (F.mono i) (F'.mono i), fun i => (smul_inf_le _ _ _).trans <\| inf_le_inf (F.smul_le i) (F'.smul_le i)⟩⟩ instance : InfSet (I.Filtration M) := ⟨fun S => { N := sInf (Ideal.Filtration.N '' S) mono := fun i => by apply sInf_le_sInf_of_forall_exists_le _ rintro _ ⟨⟨_, F, hF, rfl⟩, rfl⟩ exact ⟨_, ⟨⟨_, F, hF, rfl⟩, rfl⟩, F.mono i⟩ smul_le := fun i => by rw [sInf_eq_iInf', iInf_apply, iInf_apply] refine smul_iInf_le.trans ?_ apply iInf_mono _ rintro ⟨_, F, hF, rfl⟩ exact F.smul_le i }⟩ instance : Top (I.Filtration M) := ⟨I.trivialFiltration ⊤⟩ instance : Bot (I.Filtration M) := ⟨I.trivialFiltration ⊥⟩ @[simp] theorem sup_N : (F ⊔ F').N = F.N ⊔ F'.N := rfl set_option linter.uppercaseLean3 false in #align ideal.filtration.sup_N Ideal.Filtration.sup_N @[simp] theorem sSup_N (S : Set (I.Filtration M)) : (sSup S).N = sSup (Ideal.Filtration.N '' S) := rfl set_option linter.uppercaseLean3 false in #align ideal.filtration.Sup_N Ideal.Filtration.sSup_N @[simp] theorem inf_N : (F ⊓ F').N = F.N ⊓ F'.N := rfl set_option linter.uppercaseLean3 false in #align ideal.filtration.inf_N Ideal.Filtration.inf_N @[simp] theorem sInf_N (S : Set (I.Filtration M)) : (sInf S).N = sInf (Ideal.Filtration.N '' S) := rfl set_option linter.uppercaseLean3 false in #align ideal.filtration.Inf_N Ideal.Filtration.sInf_N @[simp] theorem top_N : (⊤ : I.Filtration M).N = ⊤ := rfl set_option linter.uppercaseLean3 false in #align ideal.filtration.top_N Ideal.Filtration.top_N @[simp] theorem bot_N : (⊥ : I.Filtration M).N = ⊥ := rfl set_option linter.uppercaseLean3 false in #align ideal.filtration.bot_N Ideal.Filtration.bot_N @[simp] theorem iSup_N {ι : Sort} (f : ι → I.Filtration M) : (iSup f).N = ⨆ i, (f i).N := congr_arg sSup (Set.range_comp _ _).symm set_option linter.uppercaseLean3 false in #align ideal.filtration.supr_N Ideal.Filtration.iSup_N @[simp] theorem iInf_N {ι : Sort} (f : ι → I.Filtration M) : (iInf f).N = ⨅ i, (f i).N := congr_arg sInf (Set.range_comp _ _).symm set_option linter.uppercaseLean3 false in #align ideal.filtration.infi_N Ideal.Filtration.iInf_N instance : CompleteLattice (I.Filtration M) := Function.Injective.completeLattice Ideal.Filtration.N Ideal.Filtration.ext sup_N inf_N (fun _ => sSup_image) (fun _ => sInf_image) top_N bot_N instance : Inhabited (I.Filtration M) := ⟨⊥⟩ def Stable : Prop := ∃ n₀, ∀ n ≥ n₀, I • F.N n = F.N (n + 1) #align ideal.filtration.stable Ideal.Filtration.Stable @[simps] def _root_.Ideal.stableFiltration (I : Ideal R) (N : Submodule R M) : I.Filtration M where N i := I ^ i • N mono i := by dsimp only; rw [add_comm, pow_add, mul_smul]; exact Submodule.smul_le_right smul_le i := by dsimp only; rw [add_comm, pow_add, mul_smul, pow_one] #align ideal.stable_filtration Ideal.stableFiltration theorem _root_.Ideal.stableFiltration_stable (I : Ideal R) (N : Submodule R M) : (I.stableFiltration N).Stable := by use 0 intro n _ dsimp rw [add_comm, pow_add, mul_smul, pow_one] #align ideal.stable_filtration_stable Ideal.stableFiltration_stable variable {F F'} (h : F.Stable)	Mathlib/RingTheory/Filtration.lean	216	223	theorem Stable.exists_pow_smul_eq : ∃ n₀, ∀ k, F.N (n₀ + k) = I ^ k • F.N n₀ := by	obtain ⟨n₀, hn⟩ := h use n₀ intro k induction' k with _ ih · simp · rw [← add_assoc, ← hn, ih, add_comm, pow_add, mul_smul, pow_one] omega
import Mathlib.LinearAlgebra.AffineSpace.Independent import Mathlib.LinearAlgebra.Basis #align_import linear_algebra.affine_space.basis from "leanprover-community/mathlib"@"2de9c37fa71dde2f1c6feff19876dd6a7b1519f0" open Affine open Set universe u₁ u₂ u₃ u₄ structure AffineBasis (ι : Type u₁) (k : Type u₂) {V : Type u₃} (P : Type u₄) [AddCommGroup V] [AffineSpace V P] [Ring k] [Module k V] where protected toFun : ι → P protected ind' : AffineIndependent k toFun protected tot' : affineSpan k (range toFun) = ⊤ #align affine_basis AffineBasis variable {ι ι' k V P : Type*} [AddCommGroup V] [AffineSpace V P] namespace AffineBasis section Ring variable [Ring k] [Module k V] (b : AffineBasis ι k P) {s : Finset ι} {i j : ι} (e : ι ≃ ι') instance : Inhabited (AffineBasis PUnit k PUnit) := ⟨⟨id, affineIndependent_of_subsingleton k id, by simp⟩⟩ instance instFunLike : FunLike (AffineBasis ι k P) ι P where coe := AffineBasis.toFun coe_injective' f g h := by cases f; cases g; congr #align affine_basis.fun_like AffineBasis.instFunLike @[ext] theorem ext {b₁ b₂ : AffineBasis ι k P} (h : (b₁ : ι → P) = b₂) : b₁ = b₂ := DFunLike.coe_injective h #align affine_basis.ext AffineBasis.ext theorem ind : AffineIndependent k b := b.ind' #align affine_basis.ind AffineBasis.ind theorem tot : affineSpan k (range b) = ⊤ := b.tot' #align affine_basis.tot AffineBasis.tot protected theorem nonempty : Nonempty ι := not_isEmpty_iff.mp fun hι => by simpa only [@range_eq_empty _ _ hι, AffineSubspace.span_empty, bot_ne_top] using b.tot #align affine_basis.nonempty AffineBasis.nonempty def reindex (e : ι ≃ ι') : AffineBasis ι' k P := ⟨b ∘ e.symm, b.ind.comp_embedding e.symm.toEmbedding, by rw [e.symm.surjective.range_comp] exact b.3⟩ #align affine_basis.reindex AffineBasis.reindex @[simp, norm_cast] theorem coe_reindex : ⇑(b.reindex e) = b ∘ e.symm := rfl #align affine_basis.coe_reindex AffineBasis.coe_reindex @[simp] theorem reindex_apply (i' : ι') : b.reindex e i' = b (e.symm i') := rfl #align affine_basis.reindex_apply AffineBasis.reindex_apply @[simp] theorem reindex_refl : b.reindex (Equiv.refl _) = b := ext rfl #align affine_basis.reindex_refl AffineBasis.reindex_refl noncomputable def basisOf (i : ι) : Basis { j : ι // j ≠ i } k V := Basis.mk ((affineIndependent_iff_linearIndependent_vsub k b i).mp b.ind) (by suffices Submodule.span k (range fun j : { x // x ≠ i } => b ↑j -ᵥ b i) = vectorSpan k (range b) by rw [this, ← direction_affineSpan, b.tot, AffineSubspace.direction_top] conv_rhs => rw [← image_univ] rw [vectorSpan_image_eq_span_vsub_set_right_ne k b (mem_univ i)] congr ext v simp) #align affine_basis.basis_of AffineBasis.basisOf @[simp] theorem basisOf_apply (i : ι) (j : { j : ι // j ≠ i }) : b.basisOf i j = b ↑j -ᵥ b i := by simp [basisOf] #align affine_basis.basis_of_apply AffineBasis.basisOf_apply @[simp] theorem basisOf_reindex (i : ι') : (b.reindex e).basisOf i = (b.basisOf <\| e.symm i).reindex (e.subtypeEquiv fun _ => e.eq_symm_apply.not) := by ext j simp #align affine_basis.basis_of_reindex AffineBasis.basisOf_reindex noncomputable def coord (i : ι) : P →ᵃ[k] k where toFun q := 1 - (b.basisOf i).sumCoords (q -ᵥ b i) linear := -(b.basisOf i).sumCoords map_vadd' q v := by dsimp only rw [vadd_vsub_assoc, LinearMap.map_add, vadd_eq_add, LinearMap.neg_apply, sub_add_eq_sub_sub_swap, add_comm, sub_eq_add_neg] #align affine_basis.coord AffineBasis.coord @[simp] theorem linear_eq_sumCoords (i : ι) : (b.coord i).linear = -(b.basisOf i).sumCoords := rfl #align affine_basis.linear_eq_sum_coords AffineBasis.linear_eq_sumCoords @[simp] theorem coord_reindex (i : ι') : (b.reindex e).coord i = b.coord (e.symm i) := by ext classical simp [AffineBasis.coord] #align affine_basis.coord_reindex AffineBasis.coord_reindex @[simp] theorem coord_apply_eq (i : ι) : b.coord i (b i) = 1 := by simp only [coord, Basis.coe_sumCoords, LinearEquiv.map_zero, LinearEquiv.coe_coe, sub_zero, AffineMap.coe_mk, Finsupp.sum_zero_index, vsub_self] #align affine_basis.coord_apply_eq AffineBasis.coord_apply_eq @[simp] theorem coord_apply_ne (h : i ≠ j) : b.coord i (b j) = 0 := by -- Porting note: -- in mathlib3 we didn't need to given the `fun j => j ≠ i` argument to `Subtype.coe_mk`, -- but I don't think we can complain: this proof was over-golfed. rw [coord, AffineMap.coe_mk, ← @Subtype.coe_mk _ (fun j => j ≠ i) j h.symm, ← b.basisOf_apply, Basis.sumCoords_self_apply, sub_self] #align affine_basis.coord_apply_ne AffineBasis.coord_apply_ne theorem coord_apply [DecidableEq ι] (i j : ι) : b.coord i (b j) = if i = j then 1 else 0 := by rcases eq_or_ne i j with h \| h <;> simp [h] #align affine_basis.coord_apply AffineBasis.coord_apply @[simp] theorem coord_apply_combination_of_mem (hi : i ∈ s) {w : ι → k} (hw : s.sum w = 1) : b.coord i (s.affineCombination k b w) = w i := by classical simp only [coord_apply, hi, Finset.affineCombination_eq_linear_combination, if_true, mul_boole, hw, Function.comp_apply, smul_eq_mul, s.sum_ite_eq, s.map_affineCombination b w hw] #align affine_basis.coord_apply_combination_of_mem AffineBasis.coord_apply_combination_of_mem @[simp] theorem coord_apply_combination_of_not_mem (hi : i ∉ s) {w : ι → k} (hw : s.sum w = 1) : b.coord i (s.affineCombination k b w) = 0 := by classical simp only [coord_apply, hi, Finset.affineCombination_eq_linear_combination, if_false, mul_boole, hw, Function.comp_apply, smul_eq_mul, s.sum_ite_eq, s.map_affineCombination b w hw] #align affine_basis.coord_apply_combination_of_not_mem AffineBasis.coord_apply_combination_of_not_mem @[simp]	Mathlib/LinearAlgebra/AffineSpace/Basis.lean	203	209	theorem sum_coord_apply_eq_one [Fintype ι] (q : P) : ∑ i, b.coord i q = 1 := by	have hq : q ∈ affineSpan k (range b) := by rw [b.tot] exact AffineSubspace.mem_top k V q obtain ⟨w, hw, rfl⟩ := eq_affineCombination_of_mem_affineSpan_of_fintype hq convert hw exact b.coord_apply_combination_of_mem (Finset.mem_univ _) hw
import Mathlib.Algebra.Module.Equiv import Mathlib.Algebra.Module.Submodule.Basic import Mathlib.Algebra.PUnitInstances import Mathlib.Data.Set.Subsingleton #align_import algebra.module.submodule.lattice from "leanprover-community/mathlib"@"f7fc89d5d5ff1db2d1242c7bb0e9062ce47ef47c" universe v variable {R S M : Type*} section AddCommMonoid variable [Semiring R] [Semiring S] [AddCommMonoid M] [Module R M] [Module S M] variable [SMul S R] [IsScalarTower S R M] variable {p q : Submodule R M} namespace Submodule instance : Bot (Submodule R M) := ⟨{ (⊥ : AddSubmonoid M) with carrier := {0} smul_mem' := by simp }⟩ instance inhabited' : Inhabited (Submodule R M) := ⟨⊥⟩ #align submodule.inhabited' Submodule.inhabited' @[simp] theorem bot_coe : ((⊥ : Submodule R M) : Set M) = {0} := rfl #align submodule.bot_coe Submodule.bot_coe @[simp] theorem bot_toAddSubmonoid : (⊥ : Submodule R M).toAddSubmonoid = ⊥ := rfl #align submodule.bot_to_add_submonoid Submodule.bot_toAddSubmonoid @[simp] lemma bot_toAddSubgroup {R M} [Ring R] [AddCommGroup M] [Module R M] : (⊥ : Submodule R M).toAddSubgroup = ⊥ := rfl variable (R) in @[simp] theorem mem_bot {x : M} : x ∈ (⊥ : Submodule R M) ↔ x = 0 := Set.mem_singleton_iff #align submodule.mem_bot Submodule.mem_bot instance uniqueBot : Unique (⊥ : Submodule R M) := ⟨inferInstance, fun x ↦ Subtype.ext <\| (mem_bot R).1 x.mem⟩ #align submodule.unique_bot Submodule.uniqueBot instance : OrderBot (Submodule R M) where bot := ⊥ bot_le p x := by simp (config := { contextual := true }) [zero_mem] protected theorem eq_bot_iff (p : Submodule R M) : p = ⊥ ↔ ∀ x ∈ p, x = (0 : M) := ⟨fun h ↦ h.symm ▸ fun _ hx ↦ (mem_bot R).mp hx, fun h ↦ eq_bot_iff.mpr fun x hx ↦ (mem_bot R).mpr (h x hx)⟩ #align submodule.eq_bot_iff Submodule.eq_bot_iff @[ext high] protected theorem bot_ext (x y : (⊥ : Submodule R M)) : x = y := by rcases x with ⟨x, xm⟩; rcases y with ⟨y, ym⟩; congr rw [(Submodule.eq_bot_iff _).mp rfl x xm] rw [(Submodule.eq_bot_iff _).mp rfl y ym] #align submodule.bot_ext Submodule.bot_ext protected theorem ne_bot_iff (p : Submodule R M) : p ≠ ⊥ ↔ ∃ x ∈ p, x ≠ (0 : M) := by simp only [ne_eq, p.eq_bot_iff, not_forall, exists_prop] #align submodule.ne_bot_iff Submodule.ne_bot_iff theorem nonzero_mem_of_bot_lt {p : Submodule R M} (bot_lt : ⊥ < p) : ∃ a : p, a ≠ 0 := let ⟨b, hb₁, hb₂⟩ := p.ne_bot_iff.mp bot_lt.ne' ⟨⟨b, hb₁⟩, hb₂ ∘ congr_arg Subtype.val⟩ #align submodule.nonzero_mem_of_bot_lt Submodule.nonzero_mem_of_bot_lt theorem exists_mem_ne_zero_of_ne_bot {p : Submodule R M} (h : p ≠ ⊥) : ∃ b : M, b ∈ p ∧ b ≠ 0 := let ⟨b, hb₁, hb₂⟩ := p.ne_bot_iff.mp h ⟨b, hb₁, hb₂⟩ #align submodule.exists_mem_ne_zero_of_ne_bot Submodule.exists_mem_ne_zero_of_ne_bot -- FIXME: we default PUnit to PUnit.{1} here without the explicit universe annotation @[simps] def botEquivPUnit : (⊥ : Submodule R M) ≃ₗ[R] PUnit.{v+1} where toFun _ := PUnit.unit invFun _ := 0 map_add' _ _ := rfl map_smul' _ _ := rfl left_inv _ := Subsingleton.elim _ _ right_inv _ := rfl #align submodule.bot_equiv_punit Submodule.botEquivPUnit	Mathlib/Algebra/Module/Submodule/Lattice.lean	122	125	theorem subsingleton_iff_eq_bot : Subsingleton p ↔ p = ⊥ := by	rw [subsingleton_iff, Submodule.eq_bot_iff] refine ⟨fun h x hx ↦ by simpa using h ⟨x, hx⟩ ⟨0, p.zero_mem⟩, fun h ⟨x, hx⟩ ⟨y, hy⟩ ↦ by simp [h x hx, h y hy]⟩
import Mathlib.Data.Vector.Basic import Mathlib.Data.Vector.Snoc set_option autoImplicit true namespace Vector section Fold section Binary variable (xs : Vector α n) (ys : Vector β n) @[simp] theorem mapAccumr₂_mapAccumr_left (f₁ : γ → β → σ₁ → σ₁ × ζ) (f₂ : α → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ (mapAccumr f₂ xs s₂).snd ys s₁) = let m := (mapAccumr₂ (fun x y s => let r₂ := f₂ x s.snd let r₁ := f₁ r₂.snd y s.fst ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂)) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem map₂_map_left (f₁ : γ → β → ζ) (f₂ : α → γ) : map₂ f₁ (map f₂ xs) ys = map₂ (fun x y => f₁ (f₂ x) y) xs ys := by induction xs, ys using Vector.revInductionOn₂ <;> simp_all @[simp] theorem mapAccumr₂_mapAccumr_right (f₁ : α → γ → σ₁ → σ₁ × ζ) (f₂ : β → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ xs (mapAccumr f₂ ys s₂).snd s₁) = let m := (mapAccumr₂ (fun x y s => let r₂ := f₂ y s.snd let r₁ := f₁ x r₂.snd s.fst ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂)) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem map₂_map_right (f₁ : α → γ → ζ) (f₂ : β → γ) : map₂ f₁ xs (map f₂ ys) = map₂ (fun x y => f₁ x (f₂ y)) xs ys := by induction xs, ys using Vector.revInductionOn₂ <;> simp_all @[simp]	Mathlib/Data/Vector/MapLemmas.lean	92	100	theorem mapAccumr_mapAccumr₂ (f₁ : γ → σ₁ → σ₁ × ζ) (f₂ : α → β → σ₂ → σ₂ × γ) : (mapAccumr f₁ (mapAccumr₂ f₂ xs ys s₂).snd s₁) = let m := mapAccumr₂ (fun x y s => let r₂ := f₂ x y s.snd let r₁ := f₁ r₂.snd s.fst ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂) (m.fst.fst, m.snd) := by	induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all
import Mathlib.NumberTheory.ZetaValues import Mathlib.NumberTheory.LSeries.RiemannZeta open Complex Real Set open scoped Nat namespace HurwitzZeta variable {k : ℕ} {x : ℝ} theorem cosZeta_two_mul_nat (hk : k ≠ 0) (hx : x ∈ Icc 0 1) : cosZeta x (2 * k) = (-1) ^ (k + 1) * (2 * π) ^ (2 * k) / 2 / (2 * k)! * ((Polynomial.bernoulli (2 * k)).map (algebraMap ℚ ℂ)).eval (x : ℂ) := by rw [← (hasSum_nat_cosZeta x (?_ : 1 < re (2 * k))).tsum_eq] refine Eq.trans ?_ <\| (congr_arg ofReal' (hasSum_one_div_nat_pow_mul_cos hk hx).tsum_eq).trans ?_ · rw [ofReal_tsum] refine tsum_congr fun n ↦ ?_ rw [mul_comm (1 / _), mul_one_div, ofReal_div, mul_assoc (2 * π), mul_comm x n, ← mul_assoc, ← Nat.cast_ofNat (R := ℂ), ← Nat.cast_mul, cpow_natCast, ofReal_pow, ofReal_natCast] · simp only [ofReal_mul, ofReal_div, ofReal_pow, ofReal_natCast, ofReal_ofNat, ofReal_neg, ofReal_one] congr 1 have : (Polynomial.bernoulli (2 * k)).map (algebraMap ℚ ℂ) = _ := (Polynomial.map_map (algebraMap ℚ ℝ) ofReal _).symm rw [this, ← ofReal_eq_coe, ← ofReal_eq_coe] apply Polynomial.map_aeval_eq_aeval_map simp only [Algebra.id.map_eq_id, RingHomCompTriple.comp_eq] · rw [← Nat.cast_ofNat, ← Nat.cast_one, ← Nat.cast_mul, natCast_re, Nat.cast_lt] omega theorem sinZeta_two_mul_nat_add_one (hk : k ≠ 0) (hx : x ∈ Icc 0 1) : sinZeta x (2 * k + 1) = (-1) ^ (k + 1) * (2 * π) ^ (2 * k + 1) / 2 / (2 * k + 1)! * ((Polynomial.bernoulli (2 * k + 1)).map (algebraMap ℚ ℂ)).eval (x : ℂ) := by rw [← (hasSum_nat_sinZeta x (?_ : 1 < re (2 * k + 1))).tsum_eq] refine Eq.trans ?_ <\| (congr_arg ofReal' (hasSum_one_div_nat_pow_mul_sin hk hx).tsum_eq).trans ?_ · rw [ofReal_tsum] refine tsum_congr fun n ↦ ?_ rw [mul_comm (1 / _), mul_one_div, ofReal_div, mul_assoc (2 * π), mul_comm x n, ← mul_assoc] congr 1 rw [← Nat.cast_ofNat, ← Nat.cast_mul, ← Nat.cast_add_one, cpow_natCast, ofReal_pow, ofReal_natCast] · simp only [ofReal_mul, ofReal_div, ofReal_pow, ofReal_natCast, ofReal_ofNat, ofReal_neg, ofReal_one] congr 1 have : (Polynomial.bernoulli (2 * k + 1)).map (algebraMap ℚ ℂ) = _ := (Polynomial.map_map (algebraMap ℚ ℝ) ofReal _).symm rw [this, ← ofReal_eq_coe, ← ofReal_eq_coe] apply Polynomial.map_aeval_eq_aeval_map simp only [Algebra.id.map_eq_id, RingHomCompTriple.comp_eq] · rw [← Nat.cast_ofNat, ← Nat.cast_one, ← Nat.cast_mul, ← Nat.cast_add_one, natCast_re, Nat.cast_lt, lt_add_iff_pos_left] exact mul_pos two_pos (Nat.pos_of_ne_zero hk)	Mathlib/NumberTheory/LSeries/HurwitzZetaValues.lean	100	110	theorem cosZeta_two_mul_nat' (hk : k ≠ 0) (hx : x ∈ Icc (0 : ℝ) 1) : cosZeta x (2 * k) = (-1) ^ (k + 1) / (2 * k) / Gammaℂ (2 * k) * ((Polynomial.bernoulli (2 * k)).map (algebraMap ℚ ℂ)).eval (x : ℂ) := by	rw [cosZeta_two_mul_nat hk hx] congr 1 have : (2 * k)! = (2 * k) * Complex.Gamma (2 * k) := by rw [(by { norm_cast; omega } : 2 * (k : ℂ) = ↑(2 * k - 1) + 1), Complex.Gamma_nat_eq_factorial, ← Nat.cast_add_one, ← Nat.cast_mul, ← Nat.factorial_succ, Nat.sub_add_cancel (by omega)] simp_rw [this, Gammaℂ, cpow_neg, ← div_div, div_inv_eq_mul, div_mul_eq_mul_div, div_div, mul_right_comm (2 : ℂ) (k : ℂ)] norm_cast
import Mathlib.LinearAlgebra.GeneralLinearGroup import Mathlib.LinearAlgebra.Matrix.Adjugate import Mathlib.LinearAlgebra.Matrix.Transvection import Mathlib.RingTheory.RootsOfUnity.Basic #align_import linear_algebra.matrix.special_linear_group from "leanprover-community/mathlib"@"f06058e64b7e8397234455038f3f8aec83aaba5a" namespace Matrix universe u v open Matrix open LinearMap section variable (n : Type u) [DecidableEq n] [Fintype n] (R : Type v) [CommRing R] def SpecialLinearGroup := { A : Matrix n n R // A.det = 1 } #align matrix.special_linear_group Matrix.SpecialLinearGroup end @[inherit_doc] scoped[MatrixGroups] notation "SL(" n ", " R ")" => Matrix.SpecialLinearGroup (Fin n) R namespace SpecialLinearGroup variable {n : Type u} [DecidableEq n] [Fintype n] {R : Type v} [CommRing R] instance hasCoeToMatrix : Coe (SpecialLinearGroup n R) (Matrix n n R) := ⟨fun A => A.val⟩ #align matrix.special_linear_group.has_coe_to_matrix Matrix.SpecialLinearGroup.hasCoeToMatrix local notation:1024 "↑ₘ" A:1024 => ((A : SpecialLinearGroup n R) : Matrix n n R) -- Porting note: moved this section upwards because it used to be not simp-normal. -- Now it is, since coercion arrows are unfolded. theorem ext_iff (A B : SpecialLinearGroup n R) : A = B ↔ ∀ i j, ↑ₘA i j = ↑ₘB i j := Subtype.ext_iff.trans Matrix.ext_iff.symm #align matrix.special_linear_group.ext_iff Matrix.SpecialLinearGroup.ext_iff @[ext] theorem ext (A B : SpecialLinearGroup n R) : (∀ i j, ↑ₘA i j = ↑ₘB i j) → A = B := (SpecialLinearGroup.ext_iff A B).mpr #align matrix.special_linear_group.ext Matrix.SpecialLinearGroup.ext instance subsingleton_of_subsingleton [Subsingleton n] : Subsingleton (SpecialLinearGroup n R) := by refine ⟨fun ⟨A, hA⟩ ⟨B, hB⟩ ↦ ?_⟩ ext i j rcases isEmpty_or_nonempty n with hn \| hn; · exfalso; exact IsEmpty.false i rw [det_eq_elem_of_subsingleton _ i] at hA hB simp only [Subsingleton.elim j i, hA, hB] instance hasInv : Inv (SpecialLinearGroup n R) := ⟨fun A => ⟨adjugate A, by rw [det_adjugate, A.prop, one_pow]⟩⟩ #align matrix.special_linear_group.has_inv Matrix.SpecialLinearGroup.hasInv instance hasMul : Mul (SpecialLinearGroup n R) := ⟨fun A B => ⟨↑ₘA * ↑ₘB, by rw [det_mul, A.prop, B.prop, one_mul]⟩⟩ #align matrix.special_linear_group.has_mul Matrix.SpecialLinearGroup.hasMul instance hasOne : One (SpecialLinearGroup n R) := ⟨⟨1, det_one⟩⟩ #align matrix.special_linear_group.has_one Matrix.SpecialLinearGroup.hasOne instance : Pow (SpecialLinearGroup n R) ℕ where pow x n := ⟨↑ₘx ^ n, (det_pow _ _).trans <\| x.prop.symm ▸ one_pow _⟩ instance : Inhabited (SpecialLinearGroup n R) := ⟨1⟩ def transpose (A : SpecialLinearGroup n R) : SpecialLinearGroup n R := ⟨A.1.transpose, A.1.det_transpose ▸ A.2⟩ @[inherit_doc] scoped postfix:1024 "ᵀ" => SpecialLinearGroup.transpose section CoeLemmas variable (A B : SpecialLinearGroup n R) -- Porting note: shouldn't be `@[simp]` because cast+mk gets reduced anyway theorem coe_mk (A : Matrix n n R) (h : det A = 1) : ↑(⟨A, h⟩ : SpecialLinearGroup n R) = A := rfl #align matrix.special_linear_group.coe_mk Matrix.SpecialLinearGroup.coe_mk @[simp] theorem coe_inv : ↑ₘA⁻¹ = adjugate A := rfl #align matrix.special_linear_group.coe_inv Matrix.SpecialLinearGroup.coe_inv @[simp] theorem coe_mul : ↑ₘ(A * B) = ↑ₘA * ↑ₘB := rfl #align matrix.special_linear_group.coe_mul Matrix.SpecialLinearGroup.coe_mul @[simp] theorem coe_one : ↑ₘ(1 : SpecialLinearGroup n R) = (1 : Matrix n n R) := rfl #align matrix.special_linear_group.coe_one Matrix.SpecialLinearGroup.coe_one @[simp] theorem det_coe : det ↑ₘA = 1 := A.2 #align matrix.special_linear_group.det_coe Matrix.SpecialLinearGroup.det_coe @[simp] theorem coe_pow (m : ℕ) : ↑ₘ(A ^ m) = ↑ₘA ^ m := rfl #align matrix.special_linear_group.coe_pow Matrix.SpecialLinearGroup.coe_pow @[simp] lemma coe_transpose (A : SpecialLinearGroup n R) : ↑ₘAᵀ = (↑ₘA)ᵀ := rfl	Mathlib/LinearAlgebra/Matrix/SpecialLinearGroup.lean	181	183	theorem det_ne_zero [Nontrivial R] (g : SpecialLinearGroup n R) : det ↑ₘg ≠ 0 := by	rw [g.det_coe] norm_num
import Mathlib.Topology.Connected.Basic import Mathlib.Topology.Separation open scoped Topology variable {X Y A} [TopologicalSpace X] [TopologicalSpace A] theorem embedding_toPullbackDiag (f : X → Y) : Embedding (toPullbackDiag f) := Embedding.mk' _ (injective_toPullbackDiag f) fun x ↦ by rw [toPullbackDiag, nhds_induced, Filter.comap_comap, nhds_prod_eq, Filter.comap_prod] erw [Filter.comap_id, inf_idem] lemma Continuous.mapPullback {X₁ X₂ Y₁ Y₂ Z₁ Z₂} [TopologicalSpace X₁] [TopologicalSpace X₂] [TopologicalSpace Z₁] [TopologicalSpace Z₂] {f₁ : X₁ → Y₁} {g₁ : Z₁ → Y₁} {f₂ : X₂ → Y₂} {g₂ : Z₂ → Y₂} {mapX : X₁ → X₂} (contX : Continuous mapX) {mapY : Y₁ → Y₂} {mapZ : Z₁ → Z₂} (contZ : Continuous mapZ) {commX : f₂ ∘ mapX = mapY ∘ f₁} {commZ : g₂ ∘ mapZ = mapY ∘ g₁} : Continuous (Function.mapPullback mapX mapY mapZ commX commZ) := by refine continuous_induced_rng.mpr (continuous_prod_mk.mpr ⟨?_, ?_⟩) <;> apply_rules [continuous_fst, continuous_snd, continuous_subtype_val, Continuous.comp] def IsSeparatedMap (f : X → Y) : Prop := ∀ x₁ x₂, f x₁ = f x₂ → x₁ ≠ x₂ → ∃ s₁ s₂, IsOpen s₁ ∧ IsOpen s₂ ∧ x₁ ∈ s₁ ∧ x₂ ∈ s₂ ∧ Disjoint s₁ s₂ lemma t2space_iff_isSeparatedMap (y : Y) : T2Space X ↔ IsSeparatedMap fun _ : X ↦ y := ⟨fun ⟨t2⟩ _ _ _ hne ↦ t2 hne, fun sep ↦ ⟨fun x₁ x₂ hne ↦ sep x₁ x₂ rfl hne⟩⟩ lemma T2Space.isSeparatedMap [T2Space X] (f : X → Y) : IsSeparatedMap f := fun _ _ _ ↦ t2_separation lemma Function.Injective.isSeparatedMap {f : X → Y} (inj : f.Injective) : IsSeparatedMap f := fun _ _ he hne ↦ (hne (inj he)).elim lemma isSeparatedMap_iff_disjoint_nhds {f : X → Y} : IsSeparatedMap f ↔ ∀ x₁ x₂, f x₁ = f x₂ → x₁ ≠ x₂ → Disjoint (𝓝 x₁) (𝓝 x₂) := forall₃_congr fun x x' _ ↦ by simp only [(nhds_basis_opens x).disjoint_iff (nhds_basis_opens x'), exists_prop, ← exists_and_left, and_assoc, and_comm, and_left_comm] lemma isSeparatedMap_iff_nhds {f : X → Y} : IsSeparatedMap f ↔ ∀ x₁ x₂, f x₁ = f x₂ → x₁ ≠ x₂ → ∃ s₁ ∈ 𝓝 x₁, ∃ s₂ ∈ 𝓝 x₂, Disjoint s₁ s₂ := by simp_rw [isSeparatedMap_iff_disjoint_nhds, Filter.disjoint_iff] open Set Filter in	Mathlib/Topology/SeparatedMap.lean	79	87	theorem isSeparatedMap_iff_isClosed_diagonal {f : X → Y} : IsSeparatedMap f ↔ IsClosed f.pullbackDiagonal := by	simp_rw [isSeparatedMap_iff_nhds, ← isOpen_compl_iff, isOpen_iff_mem_nhds, Subtype.forall, Prod.forall, nhds_induced, nhds_prod_eq] refine forall₄_congr fun x₁ x₂ _ _ ↦ ⟨fun h ↦ ?_, fun ⟨t, ht, t_sub⟩ ↦ ?_⟩ · simp_rw [← Filter.disjoint_iff, ← compl_diagonal_mem_prod] at h exact ⟨_, h, subset_rfl⟩ · obtain ⟨s₁, h₁, s₂, h₂, s_sub⟩ := mem_prod_iff.mp ht exact ⟨s₁, h₁, s₂, h₂, disjoint_left.2 fun x h₁ h₂ ↦ @t_sub ⟨(x, x), rfl⟩ (s_sub ⟨h₁, h₂⟩) rfl⟩
import Mathlib.Data.Finset.Lattice import Mathlib.Data.Set.Sigma #align_import data.finset.sigma from "leanprover-community/mathlib"@"9003f28797c0664a49e4179487267c494477d853" open Function Multiset variable {ι : Type} namespace Finset section SigmaLift variable {α β γ : ι → Type} [DecidableEq ι] def sigmaLift (f : ∀ ⦃i⦄, α i → β i → Finset (γ i)) (a : Sigma α) (b : Sigma β) : Finset (Sigma γ) := dite (a.1 = b.1) (fun h => (f (h ▸ a.2) b.2).map <\| Embedding.sigmaMk _) fun _ => ∅ #align finset.sigma_lift Finset.sigmaLift theorem mem_sigmaLift (f : ∀ ⦃i⦄, α i → β i → Finset (γ i)) (a : Sigma α) (b : Sigma β) (x : Sigma γ) : x ∈ sigmaLift f a b ↔ ∃ (ha : a.1 = x.1) (hb : b.1 = x.1), x.2 ∈ f (ha ▸ a.2) (hb ▸ b.2) := by obtain ⟨⟨i, a⟩, j, b⟩ := a, b obtain rfl \| h := Decidable.eq_or_ne i j · constructor · simp_rw [sigmaLift] simp only [dite_eq_ite, ite_true, mem_map, Embedding.sigmaMk_apply, forall_exists_index, and_imp] rintro x hx rfl exact ⟨rfl, rfl, hx⟩ · rintro ⟨⟨⟩, ⟨⟩, hx⟩ rw [sigmaLift, dif_pos rfl, mem_map] exact ⟨_, hx, by simp [Sigma.ext_iff]⟩ · rw [sigmaLift, dif_neg h] refine iff_of_false (not_mem_empty _) ?_ rintro ⟨⟨⟩, ⟨⟩, _⟩ exact h rfl #align finset.mem_sigma_lift Finset.mem_sigmaLift theorem mk_mem_sigmaLift (f : ∀ ⦃i⦄, α i → β i → Finset (γ i)) (i : ι) (a : α i) (b : β i) (x : γ i) : (⟨i, x⟩ : Sigma γ) ∈ sigmaLift f ⟨i, a⟩ ⟨i, b⟩ ↔ x ∈ f a b := by rw [sigmaLift, dif_pos rfl, mem_map] refine ⟨?_, fun hx => ⟨_, hx, rfl⟩⟩ rintro ⟨x, hx, _, rfl⟩ exact hx #align finset.mk_mem_sigma_lift Finset.mk_mem_sigmaLift theorem not_mem_sigmaLift_of_ne_left (f : ∀ ⦃i⦄, α i → β i → Finset (γ i)) (a : Sigma α) (b : Sigma β) (x : Sigma γ) (h : a.1 ≠ x.1) : x ∉ sigmaLift f a b := by rw [mem_sigmaLift] exact fun H => h H.fst #align finset.not_mem_sigma_lift_of_ne_left Finset.not_mem_sigmaLift_of_ne_left theorem not_mem_sigmaLift_of_ne_right (f : ∀ ⦃i⦄, α i → β i → Finset (γ i)) {a : Sigma α} (b : Sigma β) {x : Sigma γ} (h : b.1 ≠ x.1) : x ∉ sigmaLift f a b := by rw [mem_sigmaLift] exact fun H => h H.snd.fst #align finset.not_mem_sigma_lift_of_ne_right Finset.not_mem_sigmaLift_of_ne_right variable {f g : ∀ ⦃i⦄, α i → β i → Finset (γ i)} {a : Σi, α i} {b : Σi, β i} theorem sigmaLift_nonempty : (sigmaLift f a b).Nonempty ↔ ∃ h : a.1 = b.1, (f (h ▸ a.2) b.2).Nonempty := by simp_rw [nonempty_iff_ne_empty, sigmaLift] split_ifs with h <;> simp [h] #align finset.sigma_lift_nonempty Finset.sigmaLift_nonempty	Mathlib/Data/Finset/Sigma.lean	204	208	theorem sigmaLift_eq_empty : sigmaLift f a b = ∅ ↔ ∀ h : a.1 = b.1, f (h ▸ a.2) b.2 = ∅ := by	simp_rw [sigmaLift] split_ifs with h · simp [h, forall_prop_of_true h] · simp [h, forall_prop_of_false h]
import Mathlib.Data.DFinsupp.Basic import Mathlib.Data.Finset.Pointwise import Mathlib.LinearAlgebra.Basis.VectorSpace #align_import algebra.group.unique_prods from "leanprover-community/mathlib"@"d6fad0e5bf2d6f48da9175d25c3dc5706b3834ce" @[to_additive "Let `G` be a Type with addition, let `A B : Finset G` be finite subsets and let `a0 b0 : G` be two elements. `UniqueAdd A B a0 b0` asserts `a0 + b0` can be written in at most one way as a sum of an element from `A` and an element from `B`."] def UniqueMul {G} [Mul G] (A B : Finset G) (a0 b0 : G) : Prop := ∀ ⦃a b⦄, a ∈ A → b ∈ B → a * b = a0 * b0 → a = a0 ∧ b = b0 #align unique_mul UniqueMul #align unique_add UniqueAdd namespace UniqueMul variable {G H : Type*} [Mul G] [Mul H] {A B : Finset G} {a0 b0 : G} @[to_additive (attr := nontriviality, simp)] theorem of_subsingleton [Subsingleton G] : UniqueMul A B a0 b0 := by simp [UniqueMul, eq_iff_true_of_subsingleton] @[to_additive]	Mathlib/Algebra/Group/UniqueProds.lean	71	75	theorem of_card_le_one (hA : A.Nonempty) (hB : B.Nonempty) (hA1 : A.card ≤ 1) (hB1 : B.card ≤ 1) : ∃ a ∈ A, ∃ b ∈ B, UniqueMul A B a b := by	rw [Finset.card_le_one_iff] at hA1 hB1 obtain ⟨a, ha⟩ := hA; obtain ⟨b, hb⟩ := hB exact ⟨a, ha, b, hb, fun _ _ ha' hb' _ ↦ ⟨hA1 ha' ha, hB1 hb' hb⟩⟩
import Mathlib.Data.List.Range import Mathlib.Data.List.Perm #align_import data.list.sigma from "leanprover-community/mathlib"@"f808feb6c18afddb25e66a71d317643cf7fb5fbb" universe u v namespace List variable {α : Type u} {β : α → Type v} {l l₁ l₂ : List (Sigma β)} def keys : List (Sigma β) → List α := map Sigma.fst #align list.keys List.keys @[simp] theorem keys_nil : @keys α β [] = [] := rfl #align list.keys_nil List.keys_nil @[simp] theorem keys_cons {s} {l : List (Sigma β)} : (s :: l).keys = s.1 :: l.keys := rfl #align list.keys_cons List.keys_cons theorem mem_keys_of_mem {s : Sigma β} {l : List (Sigma β)} : s ∈ l → s.1 ∈ l.keys := mem_map_of_mem Sigma.fst #align list.mem_keys_of_mem List.mem_keys_of_mem theorem exists_of_mem_keys {a} {l : List (Sigma β)} (h : a ∈ l.keys) : ∃ b : β a, Sigma.mk a b ∈ l := let ⟨⟨_, b'⟩, m, e⟩ := exists_of_mem_map h Eq.recOn e (Exists.intro b' m) #align list.exists_of_mem_keys List.exists_of_mem_keys theorem mem_keys {a} {l : List (Sigma β)} : a ∈ l.keys ↔ ∃ b : β a, Sigma.mk a b ∈ l := ⟨exists_of_mem_keys, fun ⟨_, h⟩ => mem_keys_of_mem h⟩ #align list.mem_keys List.mem_keys theorem not_mem_keys {a} {l : List (Sigma β)} : a ∉ l.keys ↔ ∀ b : β a, Sigma.mk a b ∉ l := (not_congr mem_keys).trans not_exists #align list.not_mem_keys List.not_mem_keys theorem not_eq_key {a} {l : List (Sigma β)} : a ∉ l.keys ↔ ∀ s : Sigma β, s ∈ l → a ≠ s.1 := Iff.intro (fun h₁ s h₂ e => absurd (mem_keys_of_mem h₂) (by rwa [e] at h₁)) fun f h₁ => let ⟨b, h₂⟩ := exists_of_mem_keys h₁ f _ h₂ rfl #align list.not_eq_key List.not_eq_key def NodupKeys (l : List (Sigma β)) : Prop := l.keys.Nodup #align list.nodupkeys List.NodupKeys theorem nodupKeys_iff_pairwise {l} : NodupKeys l ↔ Pairwise (fun s s' : Sigma β => s.1 ≠ s'.1) l := pairwise_map #align list.nodupkeys_iff_pairwise List.nodupKeys_iff_pairwise theorem NodupKeys.pairwise_ne {l} (h : NodupKeys l) : Pairwise (fun s s' : Sigma β => s.1 ≠ s'.1) l := nodupKeys_iff_pairwise.1 h #align list.nodupkeys.pairwise_ne List.NodupKeys.pairwise_ne @[simp] theorem nodupKeys_nil : @NodupKeys α β [] := Pairwise.nil #align list.nodupkeys_nil List.nodupKeys_nil @[simp] theorem nodupKeys_cons {s : Sigma β} {l : List (Sigma β)} : NodupKeys (s :: l) ↔ s.1 ∉ l.keys ∧ NodupKeys l := by simp [keys, NodupKeys] #align list.nodupkeys_cons List.nodupKeys_cons theorem not_mem_keys_of_nodupKeys_cons {s : Sigma β} {l : List (Sigma β)} (h : NodupKeys (s :: l)) : s.1 ∉ l.keys := (nodupKeys_cons.1 h).1 #align list.not_mem_keys_of_nodupkeys_cons List.not_mem_keys_of_nodupKeys_cons theorem nodupKeys_of_nodupKeys_cons {s : Sigma β} {l : List (Sigma β)} (h : NodupKeys (s :: l)) : NodupKeys l := (nodupKeys_cons.1 h).2 #align list.nodupkeys_of_nodupkeys_cons List.nodupKeys_of_nodupKeys_cons theorem NodupKeys.eq_of_fst_eq {l : List (Sigma β)} (nd : NodupKeys l) {s s' : Sigma β} (h : s ∈ l) (h' : s' ∈ l) : s.1 = s'.1 → s = s' := @Pairwise.forall_of_forall _ (fun s s' : Sigma β => s.1 = s'.1 → s = s') _ (fun _ _ H h => (H h.symm).symm) (fun _ _ _ => rfl) ((nodupKeys_iff_pairwise.1 nd).imp fun h h' => (h h').elim) _ h _ h' #align list.nodupkeys.eq_of_fst_eq List.NodupKeys.eq_of_fst_eq theorem NodupKeys.eq_of_mk_mem {a : α} {b b' : β a} {l : List (Sigma β)} (nd : NodupKeys l) (h : Sigma.mk a b ∈ l) (h' : Sigma.mk a b' ∈ l) : b = b' := by cases nd.eq_of_fst_eq h h' rfl; rfl #align list.nodupkeys.eq_of_mk_mem List.NodupKeys.eq_of_mk_mem theorem nodupKeys_singleton (s : Sigma β) : NodupKeys [s] := nodup_singleton _ #align list.nodupkeys_singleton List.nodupKeys_singleton theorem NodupKeys.sublist {l₁ l₂ : List (Sigma β)} (h : l₁ <+ l₂) : NodupKeys l₂ → NodupKeys l₁ := Nodup.sublist <\| h.map _ #align list.nodupkeys.sublist List.NodupKeys.sublist protected theorem NodupKeys.nodup {l : List (Sigma β)} : NodupKeys l → Nodup l := Nodup.of_map _ #align list.nodupkeys.nodup List.NodupKeys.nodup theorem perm_nodupKeys {l₁ l₂ : List (Sigma β)} (h : l₁ ~ l₂) : NodupKeys l₁ ↔ NodupKeys l₂ := (h.map _).nodup_iff #align list.perm_nodupkeys List.perm_nodupKeys theorem nodupKeys_join {L : List (List (Sigma β))} : NodupKeys (join L) ↔ (∀ l ∈ L, NodupKeys l) ∧ Pairwise Disjoint (L.map keys) := by rw [nodupKeys_iff_pairwise, pairwise_join, pairwise_map] refine and_congr (forall₂_congr fun l _ => by simp [nodupKeys_iff_pairwise]) ?_ apply iff_of_eq; congr with (l₁ l₂) simp [keys, disjoint_iff_ne] #align list.nodupkeys_join List.nodupKeys_join theorem nodup_enum_map_fst (l : List α) : (l.enum.map Prod.fst).Nodup := by simp [List.nodup_range] #align list.nodup_enum_map_fst List.nodup_enum_map_fst theorem mem_ext {l₀ l₁ : List (Sigma β)} (nd₀ : l₀.Nodup) (nd₁ : l₁.Nodup) (h : ∀ x, x ∈ l₀ ↔ x ∈ l₁) : l₀ ~ l₁ := (perm_ext_iff_of_nodup nd₀ nd₁).2 h #align list.mem_ext List.mem_ext variable [DecidableEq α] -- Porting note: renaming to `dlookup` since `lookup` already exists def dlookup (a : α) : List (Sigma β) → Option (β a) \| [] => none \| ⟨a', b⟩ :: l => if h : a' = a then some (Eq.recOn h b) else dlookup a l #align list.lookup List.dlookup @[simp] theorem dlookup_nil (a : α) : dlookup a [] = @none (β a) := rfl #align list.lookup_nil List.dlookup_nil @[simp] theorem dlookup_cons_eq (l) (a : α) (b : β a) : dlookup a (⟨a, b⟩ :: l) = some b := dif_pos rfl #align list.lookup_cons_eq List.dlookup_cons_eq @[simp] theorem dlookup_cons_ne (l) {a} : ∀ s : Sigma β, a ≠ s.1 → dlookup a (s :: l) = dlookup a l \| ⟨_, _⟩, h => dif_neg h.symm #align list.lookup_cons_ne List.dlookup_cons_ne theorem dlookup_isSome {a : α} : ∀ {l : List (Sigma β)}, (dlookup a l).isSome ↔ a ∈ l.keys \| [] => by simp \| ⟨a', b⟩ :: l => by by_cases h : a = a' · subst a' simp · simp [h, dlookup_isSome] #align list.lookup_is_some List.dlookup_isSome theorem dlookup_eq_none {a : α} {l : List (Sigma β)} : dlookup a l = none ↔ a ∉ l.keys := by simp [← dlookup_isSome, Option.isNone_iff_eq_none] #align list.lookup_eq_none List.dlookup_eq_none theorem of_mem_dlookup {a : α} {b : β a} : ∀ {l : List (Sigma β)}, b ∈ dlookup a l → Sigma.mk a b ∈ l \| ⟨a', b'⟩ :: l, H => by by_cases h : a = a' · subst a' simp? at H says simp only [dlookup_cons_eq, Option.mem_def, Option.some.injEq] at H simp [H] · simp only [ne_eq, h, not_false_iff, dlookup_cons_ne] at H simp [of_mem_dlookup H] #align list.of_mem_lookup List.of_mem_dlookup theorem mem_dlookup {a} {b : β a} {l : List (Sigma β)} (nd : l.NodupKeys) (h : Sigma.mk a b ∈ l) : b ∈ dlookup a l := by cases' Option.isSome_iff_exists.mp (dlookup_isSome.mpr (mem_keys_of_mem h)) with b' h' cases nd.eq_of_mk_mem h (of_mem_dlookup h') exact h' #align list.mem_lookup List.mem_dlookup theorem map_dlookup_eq_find (a : α) : ∀ l : List (Sigma β), (dlookup a l).map (Sigma.mk a) = find? (fun s => a = s.1) l \| [] => rfl \| ⟨a', b'⟩ :: l => by by_cases h : a = a' · subst a' simp · simpa [h] using map_dlookup_eq_find a l #align list.map_lookup_eq_find List.map_dlookup_eq_find theorem mem_dlookup_iff {a : α} {b : β a} {l : List (Sigma β)} (nd : l.NodupKeys) : b ∈ dlookup a l ↔ Sigma.mk a b ∈ l := ⟨of_mem_dlookup, mem_dlookup nd⟩ #align list.mem_lookup_iff List.mem_dlookup_iff theorem perm_dlookup (a : α) {l₁ l₂ : List (Sigma β)} (nd₁ : l₁.NodupKeys) (nd₂ : l₂.NodupKeys) (p : l₁ ~ l₂) : dlookup a l₁ = dlookup a l₂ := by ext b; simp only [mem_dlookup_iff nd₁, mem_dlookup_iff nd₂]; exact p.mem_iff #align list.perm_lookup List.perm_dlookup theorem lookup_ext {l₀ l₁ : List (Sigma β)} (nd₀ : l₀.NodupKeys) (nd₁ : l₁.NodupKeys) (h : ∀ x y, y ∈ l₀.dlookup x ↔ y ∈ l₁.dlookup x) : l₀ ~ l₁ := mem_ext nd₀.nodup nd₁.nodup fun ⟨a, b⟩ => by rw [← mem_dlookup_iff, ← mem_dlookup_iff, h] <;> assumption #align list.lookup_ext List.lookup_ext def lookupAll (a : α) : List (Sigma β) → List (β a) \| [] => [] \| ⟨a', b⟩ :: l => if h : a' = a then Eq.recOn h b :: lookupAll a l else lookupAll a l #align list.lookup_all List.lookupAll @[simp] theorem lookupAll_nil (a : α) : lookupAll a [] = @nil (β a) := rfl #align list.lookup_all_nil List.lookupAll_nil @[simp] theorem lookupAll_cons_eq (l) (a : α) (b : β a) : lookupAll a (⟨a, b⟩ :: l) = b :: lookupAll a l := dif_pos rfl #align list.lookup_all_cons_eq List.lookupAll_cons_eq @[simp] theorem lookupAll_cons_ne (l) {a} : ∀ s : Sigma β, a ≠ s.1 → lookupAll a (s :: l) = lookupAll a l \| ⟨_, _⟩, h => dif_neg h.symm #align list.lookup_all_cons_ne List.lookupAll_cons_ne theorem lookupAll_eq_nil {a : α} : ∀ {l : List (Sigma β)}, lookupAll a l = [] ↔ ∀ b : β a, Sigma.mk a b ∉ l \| [] => by simp \| ⟨a', b⟩ :: l => by by_cases h : a = a' · subst a' simp only [lookupAll_cons_eq, mem_cons, Sigma.mk.inj_iff, heq_eq_eq, true_and, not_or, false_iff, not_forall, not_and, not_not] use b simp · simp [h, lookupAll_eq_nil] #align list.lookup_all_eq_nil List.lookupAll_eq_nil theorem head?_lookupAll (a : α) : ∀ l : List (Sigma β), head? (lookupAll a l) = dlookup a l \| [] => by simp \| ⟨a', b⟩ :: l => by by_cases h : a = a' · subst h; simp · rw [lookupAll_cons_ne, dlookup_cons_ne, head?_lookupAll a l] <;> assumption #align list.head_lookup_all List.head?_lookupAll theorem mem_lookupAll {a : α} {b : β a} : ∀ {l : List (Sigma β)}, b ∈ lookupAll a l ↔ Sigma.mk a b ∈ l \| [] => by simp \| ⟨a', b'⟩ :: l => by by_cases h : a = a' · subst h simp [, mem_lookupAll] · simp [, mem_lookupAll] #align list.mem_lookup_all List.mem_lookupAll theorem lookupAll_sublist (a : α) : ∀ l : List (Sigma β), (lookupAll a l).map (Sigma.mk a) <+ l \| [] => by simp \| ⟨a', b'⟩ :: l => by by_cases h : a = a' · subst h simp only [ne_eq, not_true, lookupAll_cons_eq, List.map] exact (lookupAll_sublist a l).cons₂ _ · simp only [ne_eq, h, not_false_iff, lookupAll_cons_ne] exact (lookupAll_sublist a l).cons _ #align list.lookup_all_sublist List.lookupAll_sublist theorem lookupAll_length_le_one (a : α) {l : List (Sigma β)} (h : l.NodupKeys) : length (lookupAll a l) ≤ 1 := by have := Nodup.sublist ((lookupAll_sublist a l).map _) h rw [map_map] at this rwa [← nodup_replicate, ← map_const] #align list.lookup_all_length_le_one List.lookupAll_length_le_one theorem lookupAll_eq_dlookup (a : α) {l : List (Sigma β)} (h : l.NodupKeys) : lookupAll a l = (dlookup a l).toList := by rw [← head?_lookupAll] have h1 := lookupAll_length_le_one a h; revert h1 rcases lookupAll a l with (_ \| ⟨b, _ \| ⟨c, l⟩⟩) <;> intro h1 <;> try rfl exact absurd h1 (by simp) #align list.lookup_all_eq_lookup List.lookupAll_eq_dlookup theorem lookupAll_nodup (a : α) {l : List (Sigma β)} (h : l.NodupKeys) : (lookupAll a l).Nodup := by (rw [lookupAll_eq_dlookup a h]; apply Option.toList_nodup) #align list.lookup_all_nodup List.lookupAll_nodup theorem perm_lookupAll (a : α) {l₁ l₂ : List (Sigma β)} (nd₁ : l₁.NodupKeys) (nd₂ : l₂.NodupKeys) (p : l₁ ~ l₂) : lookupAll a l₁ = lookupAll a l₂ := by simp [lookupAll_eq_dlookup, nd₁, nd₂, perm_dlookup a nd₁ nd₂ p] #align list.perm_lookup_all List.perm_lookupAll def kreplace (a : α) (b : β a) : List (Sigma β) → List (Sigma β) := lookmap fun s => if a = s.1 then some ⟨a, b⟩ else none #align list.kreplace List.kreplace theorem kreplace_of_forall_not (a : α) (b : β a) {l : List (Sigma β)} (H : ∀ b : β a, Sigma.mk a b ∉ l) : kreplace a b l = l := lookmap_of_forall_not _ <\| by rintro ⟨a', b'⟩ h; dsimp; split_ifs · subst a' exact H _ h · rfl #align list.kreplace_of_forall_not List.kreplace_of_forall_not theorem kreplace_self {a : α} {b : β a} {l : List (Sigma β)} (nd : NodupKeys l) (h : Sigma.mk a b ∈ l) : kreplace a b l = l := by refine (lookmap_congr ?_).trans (lookmap_id' (Option.guard fun (s : Sigma β) => a = s.1) ?_ _) · rintro ⟨a', b'⟩ h' dsimp [Option.guard] split_ifs · subst a' simp [nd.eq_of_mk_mem h h'] · rfl · rintro ⟨a₁, b₁⟩ ⟨a₂, b₂⟩ dsimp [Option.guard] split_ifs · simp · rintro ⟨⟩ #align list.kreplace_self List.kreplace_self theorem keys_kreplace (a : α) (b : β a) : ∀ l : List (Sigma β), (kreplace a b l).keys = l.keys := lookmap_map_eq _ _ <\| by rintro ⟨a₁, b₂⟩ ⟨a₂, b₂⟩ dsimp split_ifs with h <;> simp (config := { contextual := true }) [h] #align list.keys_kreplace List.keys_kreplace theorem kreplace_nodupKeys (a : α) (b : β a) {l : List (Sigma β)} : (kreplace a b l).NodupKeys ↔ l.NodupKeys := by simp [NodupKeys, keys_kreplace] #align list.kreplace_nodupkeys List.kreplace_nodupKeys theorem Perm.kreplace {a : α} {b : β a} {l₁ l₂ : List (Sigma β)} (nd : l₁.NodupKeys) : l₁ ~ l₂ → kreplace a b l₁ ~ kreplace a b l₂ := perm_lookmap _ <\| by refine nd.pairwise_ne.imp ?_ intro x y h z h₁ w h₂ split_ifs at h₁ h₂ with h_2 h_1 <;> cases h₁ <;> cases h₂ exact (h (h_2.symm.trans h_1)).elim #align list.perm.kreplace List.Perm.kreplace def kerase (a : α) : List (Sigma β) → List (Sigma β) := eraseP fun s => a = s.1 #align list.kerase List.kerase -- Porting note (#10618): removing @[simp], `simp` can prove it theorem kerase_nil {a} : @kerase _ β _ a [] = [] := rfl #align list.kerase_nil List.kerase_nil @[simp]	Mathlib/Data/List/Sigma.lean	402	403	theorem kerase_cons_eq {a} {s : Sigma β} {l : List (Sigma β)} (h : a = s.1) : kerase a (s :: l) = l := by	simp [kerase, h]
import Mathlib.Topology.Sheaves.Presheaf import Mathlib.CategoryTheory.Adjunction.FullyFaithful #align_import algebraic_geometry.presheafed_space from "leanprover-community/mathlib"@"d39590fc8728fbf6743249802486f8c91ffe07bc" open Opposite CategoryTheory CategoryTheory.Category CategoryTheory.Functor TopCat TopologicalSpace variable (C : Type) [Category C] -- Porting note: we used to have: -- local attribute [tidy] tactic.auto_cases_opens -- We would replace this by: -- attribute [local aesop safe cases (rule_sets := [CategoryTheory])] Opens -- although it doesn't appear to help in this file, in any case. -- Porting note: we used to have: -- local attribute [tidy] tactic.op_induction' -- A possible replacement would be: -- attribute [local aesop safe cases (rule_sets := [CategoryTheory])] Opposite -- but this would probably require https://github.com/JLimperg/aesop/issues/59 -- In any case, it doesn't seem necessary here. namespace AlgebraicGeometry -- Porting note: `PresheafSpace.{w} C` is the type of topological spaces in `Type w` equipped -- with a presheaf with values in `C`; then there is a total of three universe parameters -- in `PresheafSpace.{w, v, u} C`, where `C : Type u` and `Category.{v} C`. -- In mathlib3, some definitions in this file unnecessarily assumed `w=v`. This restriction -- has been removed. structure PresheafedSpace where carrier : TopCat protected presheaf : carrier.Presheaf C set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace AlgebraicGeometry.PresheafedSpace variable {C} namespace PresheafedSpace -- Porting note: using `Coe` here triggers an error, `CoeOut` seems an acceptable alternative instance coeCarrier : CoeOut (PresheafedSpace C) TopCat where coe X := X.carrier set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.coe_carrier AlgebraicGeometry.PresheafedSpace.coeCarrier attribute [coe] PresheafedSpace.carrier -- Porting note: we add this instance, as Lean does not reliably use the `CoeOut` instance above -- in downstream files. instance : CoeSort (PresheafedSpace C) Type where coe := fun X => X.carrier -- Porting note: the following lemma is removed because it is a syntactic tauto set_option linter.uppercaseLean3 false in #noalign algebraic_geometry.PresheafedSpace.as_coe -- Porting note: removed @[simp] as the `simpVarHead` linter complains -- @[simp] theorem mk_coe (carrier) (presheaf) : (({ carrier presheaf } : PresheafedSpace C) : TopCat) = carrier := rfl set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.mk_coe AlgebraicGeometry.PresheafedSpace.mk_coe instance (X : PresheafedSpace C) : TopologicalSpace X := X.carrier.str def const (X : TopCat) (Z : C) : PresheafedSpace C where carrier := X presheaf := (Functor.const _).obj Z set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.const AlgebraicGeometry.PresheafedSpace.const instance [Inhabited C] : Inhabited (PresheafedSpace C) := ⟨const (TopCat.of PEmpty) default⟩ structure Hom (X Y : PresheafedSpace C) where base : (X : TopCat) ⟶ (Y : TopCat) c : Y.presheaf ⟶ base _* X.presheaf set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.hom AlgebraicGeometry.PresheafedSpace.Hom -- Porting note: eventually, the ext lemma shall be applied to terms in `X ⟶ Y` -- rather than `Hom X Y`, this one was renamed `Hom.ext` instead of `ext`, -- and the more practical lemma `ext` is defined just after the definition -- of the `Category` instance @[ext] theorem Hom.ext {X Y : PresheafedSpace C} (α β : Hom X Y) (w : α.base = β.base) (h : α.c ≫ whiskerRight (eqToHom (by rw [w])) _ = β.c) : α = β := by rcases α with ⟨base, c⟩ rcases β with ⟨base', c'⟩ dsimp at w subst w dsimp at h erw [whiskerRight_id', comp_id] at h subst h rfl set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.ext AlgebraicGeometry.PresheafedSpace.Hom.ext -- TODO including `injections` would make tidy work earlier. theorem hext {X Y : PresheafedSpace C} (α β : Hom X Y) (w : α.base = β.base) (h : HEq α.c β.c) : α = β := by cases α cases β congr set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.hext AlgebraicGeometry.PresheafedSpace.hext -- Porting note: `eqToHom` is no longer necessary in the definition of `c` def id (X : PresheafedSpace C) : Hom X X where base := 𝟙 (X : TopCat) c := 𝟙 _ set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.id AlgebraicGeometry.PresheafedSpace.id instance homInhabited (X : PresheafedSpace C) : Inhabited (Hom X X) := ⟨id X⟩ set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.hom_inhabited AlgebraicGeometry.PresheafedSpace.homInhabited def comp {X Y Z : PresheafedSpace C} (α : Hom X Y) (β : Hom Y Z) : Hom X Z where base := α.base ≫ β.base c := β.c ≫ (Presheaf.pushforward _ β.base).map α.c set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.comp AlgebraicGeometry.PresheafedSpace.comp theorem comp_c {X Y Z : PresheafedSpace C} (α : Hom X Y) (β : Hom Y Z) : (comp α β).c = β.c ≫ (Presheaf.pushforward _ β.base).map α.c := rfl set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.comp_c AlgebraicGeometry.PresheafedSpace.comp_c variable (C) section attribute [local simp] id comp -- Porting note: in mathlib3, `tidy` could (almost) prove the category axioms, but proofs -- were included because `tidy` was slow. Here, `aesop_cat` succeeds reasonably quickly -- for `comp_id` and `assoc` instance categoryOfPresheafedSpaces : Category (PresheafedSpace C) where Hom := Hom id := id comp := comp id_comp _ := by dsimp ext · dsimp simp · dsimp simp only [map_id, whiskerRight_id', assoc] erw [comp_id, comp_id] set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.category_of_PresheafedSpaces AlgebraicGeometry.PresheafedSpace.categoryOfPresheafedSpaces variable {C} -- Porting note: adding an ext lemma. -- See https://github.com/leanprover-community/mathlib4/issues/5229 @[ext] theorem ext {X Y : PresheafedSpace C} (α β : X ⟶ Y) (w : α.base = β.base) (h : α.c ≫ whiskerRight (eqToHom (by rw [w])) _ = β.c) : α = β := Hom.ext α β w h end variable {C} attribute [local simp] eqToHom_map @[simp] theorem id_base (X : PresheafedSpace C) : (𝟙 X : X ⟶ X).base = 𝟙 (X : TopCat) := rfl set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.id_base AlgebraicGeometry.PresheafedSpace.id_base -- Porting note: `eqToHom` is no longer needed in the statements of `id_c` and `id_c_app` theorem id_c (X : PresheafedSpace C) : (𝟙 X : X ⟶ X).c = 𝟙 X.presheaf := rfl set_option linter.uppercaseLean3 false in #align algebraic_geometry.PresheafedSpace.id_c AlgebraicGeometry.PresheafedSpace.id_c @[simp]	Mathlib/Geometry/RingedSpace/PresheafedSpace.lean	215	218	theorem id_c_app (X : PresheafedSpace C) (U) : (𝟙 X : X ⟶ X).c.app U = X.presheaf.map (𝟙 U) := by	rw [id_c, map_id] rfl
import Mathlib.Algebra.Module.BigOperators import Mathlib.Data.Fintype.BigOperators import Mathlib.LinearAlgebra.AffineSpace.AffineMap import Mathlib.LinearAlgebra.AffineSpace.AffineSubspace import Mathlib.LinearAlgebra.Finsupp import Mathlib.Tactic.FinCases #align_import linear_algebra.affine_space.combination from "leanprover-community/mathlib"@"2de9c37fa71dde2f1c6feff19876dd6a7b1519f0" noncomputable section open Affine namespace Finset theorem univ_fin2 : (univ : Finset (Fin 2)) = {0, 1} := by ext x fin_cases x <;> simp #align finset.univ_fin2 Finset.univ_fin2 variable {k : Type} {V : Type} {P : Type} [Ring k] [AddCommGroup V] [Module k V] variable [S : AffineSpace V P] variable {ι : Type} (s : Finset ι) variable {ι₂ : Type*} (s₂ : Finset ι₂) def weightedVSubOfPoint (p : ι → P) (b : P) : (ι → k) →ₗ[k] V := ∑ i ∈ s, (LinearMap.proj i : (ι → k) →ₗ[k] k).smulRight (p i -ᵥ b) #align finset.weighted_vsub_of_point Finset.weightedVSubOfPoint @[simp] theorem weightedVSubOfPoint_apply (w : ι → k) (p : ι → P) (b : P) : s.weightedVSubOfPoint p b w = ∑ i ∈ s, w i • (p i -ᵥ b) := by simp [weightedVSubOfPoint, LinearMap.sum_apply] #align finset.weighted_vsub_of_point_apply Finset.weightedVSubOfPoint_apply @[simp (high)] theorem weightedVSubOfPoint_apply_const (w : ι → k) (p : P) (b : P) : s.weightedVSubOfPoint (fun _ => p) b w = (∑ i ∈ s, w i) • (p -ᵥ b) := by rw [weightedVSubOfPoint_apply, sum_smul] #align finset.weighted_vsub_of_point_apply_const Finset.weightedVSubOfPoint_apply_const theorem weightedVSubOfPoint_congr {w₁ w₂ : ι → k} (hw : ∀ i ∈ s, w₁ i = w₂ i) {p₁ p₂ : ι → P} (hp : ∀ i ∈ s, p₁ i = p₂ i) (b : P) : s.weightedVSubOfPoint p₁ b w₁ = s.weightedVSubOfPoint p₂ b w₂ := by simp_rw [weightedVSubOfPoint_apply] refine sum_congr rfl fun i hi => ?_ rw [hw i hi, hp i hi] #align finset.weighted_vsub_of_point_congr Finset.weightedVSubOfPoint_congr theorem weightedVSubOfPoint_eq_of_weights_eq (p : ι → P) (j : ι) (w₁ w₂ : ι → k) (hw : ∀ i, i ≠ j → w₁ i = w₂ i) : s.weightedVSubOfPoint p (p j) w₁ = s.weightedVSubOfPoint p (p j) w₂ := by simp only [Finset.weightedVSubOfPoint_apply] congr ext i rcases eq_or_ne i j with h \| h · simp [h] · simp [hw i h] #align finset.weighted_vsub_of_point_eq_of_weights_eq Finset.weightedVSubOfPoint_eq_of_weights_eq theorem weightedVSubOfPoint_eq_of_sum_eq_zero (w : ι → k) (p : ι → P) (h : ∑ i ∈ s, w i = 0) (b₁ b₂ : P) : s.weightedVSubOfPoint p b₁ w = s.weightedVSubOfPoint p b₂ w := by apply eq_of_sub_eq_zero rw [weightedVSubOfPoint_apply, weightedVSubOfPoint_apply, ← sum_sub_distrib] conv_lhs => congr · skip · ext rw [← smul_sub, vsub_sub_vsub_cancel_left] rw [← sum_smul, h, zero_smul] #align finset.weighted_vsub_of_point_eq_of_sum_eq_zero Finset.weightedVSubOfPoint_eq_of_sum_eq_zero theorem weightedVSubOfPoint_vadd_eq_of_sum_eq_one (w : ι → k) (p : ι → P) (h : ∑ i ∈ s, w i = 1) (b₁ b₂ : P) : s.weightedVSubOfPoint p b₁ w +ᵥ b₁ = s.weightedVSubOfPoint p b₂ w +ᵥ b₂ := by erw [weightedVSubOfPoint_apply, weightedVSubOfPoint_apply, ← @vsub_eq_zero_iff_eq V, vadd_vsub_assoc, vsub_vadd_eq_vsub_sub, ← add_sub_assoc, add_comm, add_sub_assoc, ← sum_sub_distrib] conv_lhs => congr · skip · congr · skip · ext rw [← smul_sub, vsub_sub_vsub_cancel_left] rw [← sum_smul, h, one_smul, vsub_add_vsub_cancel, vsub_self] #align finset.weighted_vsub_of_point_vadd_eq_of_sum_eq_one Finset.weightedVSubOfPoint_vadd_eq_of_sum_eq_one @[simp (high)] theorem weightedVSubOfPoint_erase [DecidableEq ι] (w : ι → k) (p : ι → P) (i : ι) : (s.erase i).weightedVSubOfPoint p (p i) w = s.weightedVSubOfPoint p (p i) w := by rw [weightedVSubOfPoint_apply, weightedVSubOfPoint_apply] apply sum_erase rw [vsub_self, smul_zero] #align finset.weighted_vsub_of_point_erase Finset.weightedVSubOfPoint_erase @[simp (high)] theorem weightedVSubOfPoint_insert [DecidableEq ι] (w : ι → k) (p : ι → P) (i : ι) : (insert i s).weightedVSubOfPoint p (p i) w = s.weightedVSubOfPoint p (p i) w := by rw [weightedVSubOfPoint_apply, weightedVSubOfPoint_apply] apply sum_insert_zero rw [vsub_self, smul_zero] #align finset.weighted_vsub_of_point_insert Finset.weightedVSubOfPoint_insert theorem weightedVSubOfPoint_indicator_subset (w : ι → k) (p : ι → P) (b : P) {s₁ s₂ : Finset ι} (h : s₁ ⊆ s₂) : s₁.weightedVSubOfPoint p b w = s₂.weightedVSubOfPoint p b (Set.indicator (↑s₁) w) := by rw [weightedVSubOfPoint_apply, weightedVSubOfPoint_apply] exact Eq.symm <\| sum_indicator_subset_of_eq_zero w (fun i wi => wi • (p i -ᵥ b : V)) h fun i => zero_smul k _ #align finset.weighted_vsub_of_point_indicator_subset Finset.weightedVSubOfPoint_indicator_subset theorem weightedVSubOfPoint_map (e : ι₂ ↪ ι) (w : ι → k) (p : ι → P) (b : P) : (s₂.map e).weightedVSubOfPoint p b w = s₂.weightedVSubOfPoint (p ∘ e) b (w ∘ e) := by simp_rw [weightedVSubOfPoint_apply] exact Finset.sum_map _ _ _ #align finset.weighted_vsub_of_point_map Finset.weightedVSubOfPoint_map theorem sum_smul_vsub_eq_weightedVSubOfPoint_sub (w : ι → k) (p₁ p₂ : ι → P) (b : P) : (∑ i ∈ s, w i • (p₁ i -ᵥ p₂ i)) = s.weightedVSubOfPoint p₁ b w - s.weightedVSubOfPoint p₂ b w := by simp_rw [weightedVSubOfPoint_apply, ← sum_sub_distrib, ← smul_sub, vsub_sub_vsub_cancel_right] #align finset.sum_smul_vsub_eq_weighted_vsub_of_point_sub Finset.sum_smul_vsub_eq_weightedVSubOfPoint_sub theorem sum_smul_vsub_const_eq_weightedVSubOfPoint_sub (w : ι → k) (p₁ : ι → P) (p₂ b : P) : (∑ i ∈ s, w i • (p₁ i -ᵥ p₂)) = s.weightedVSubOfPoint p₁ b w - (∑ i ∈ s, w i) • (p₂ -ᵥ b) := by rw [sum_smul_vsub_eq_weightedVSubOfPoint_sub, weightedVSubOfPoint_apply_const] #align finset.sum_smul_vsub_const_eq_weighted_vsub_of_point_sub Finset.sum_smul_vsub_const_eq_weightedVSubOfPoint_sub theorem sum_smul_const_vsub_eq_sub_weightedVSubOfPoint (w : ι → k) (p₂ : ι → P) (p₁ b : P) : (∑ i ∈ s, w i • (p₁ -ᵥ p₂ i)) = (∑ i ∈ s, w i) • (p₁ -ᵥ b) - s.weightedVSubOfPoint p₂ b w := by rw [sum_smul_vsub_eq_weightedVSubOfPoint_sub, weightedVSubOfPoint_apply_const] #align finset.sum_smul_const_vsub_eq_sub_weighted_vsub_of_point Finset.sum_smul_const_vsub_eq_sub_weightedVSubOfPoint theorem weightedVSubOfPoint_sdiff [DecidableEq ι] {s₂ : Finset ι} (h : s₂ ⊆ s) (w : ι → k) (p : ι → P) (b : P) : (s \ s₂).weightedVSubOfPoint p b w + s₂.weightedVSubOfPoint p b w = s.weightedVSubOfPoint p b w := by simp_rw [weightedVSubOfPoint_apply, sum_sdiff h] #align finset.weighted_vsub_of_point_sdiff Finset.weightedVSubOfPoint_sdiff theorem weightedVSubOfPoint_sdiff_sub [DecidableEq ι] {s₂ : Finset ι} (h : s₂ ⊆ s) (w : ι → k) (p : ι → P) (b : P) : (s \ s₂).weightedVSubOfPoint p b w - s₂.weightedVSubOfPoint p b (-w) = s.weightedVSubOfPoint p b w := by rw [map_neg, sub_neg_eq_add, s.weightedVSubOfPoint_sdiff h] #align finset.weighted_vsub_of_point_sdiff_sub Finset.weightedVSubOfPoint_sdiff_sub theorem weightedVSubOfPoint_subtype_eq_filter (w : ι → k) (p : ι → P) (b : P) (pred : ι → Prop) [DecidablePred pred] : ((s.subtype pred).weightedVSubOfPoint (fun i => p i) b fun i => w i) = (s.filter pred).weightedVSubOfPoint p b w := by rw [weightedVSubOfPoint_apply, weightedVSubOfPoint_apply, ← sum_subtype_eq_sum_filter] #align finset.weighted_vsub_of_point_subtype_eq_filter Finset.weightedVSubOfPoint_subtype_eq_filter theorem weightedVSubOfPoint_filter_of_ne (w : ι → k) (p : ι → P) (b : P) {pred : ι → Prop} [DecidablePred pred] (h : ∀ i ∈ s, w i ≠ 0 → pred i) : (s.filter pred).weightedVSubOfPoint p b w = s.weightedVSubOfPoint p b w := by rw [weightedVSubOfPoint_apply, weightedVSubOfPoint_apply, sum_filter_of_ne] intro i hi hne refine h i hi ?_ intro hw simp [hw] at hne #align finset.weighted_vsub_of_point_filter_of_ne Finset.weightedVSubOfPoint_filter_of_ne theorem weightedVSubOfPoint_const_smul (w : ι → k) (p : ι → P) (b : P) (c : k) : s.weightedVSubOfPoint p b (c • w) = c • s.weightedVSubOfPoint p b w := by simp_rw [weightedVSubOfPoint_apply, smul_sum, Pi.smul_apply, smul_smul, smul_eq_mul] #align finset.weighted_vsub_of_point_const_smul Finset.weightedVSubOfPoint_const_smul def weightedVSub (p : ι → P) : (ι → k) →ₗ[k] V := s.weightedVSubOfPoint p (Classical.choice S.nonempty) #align finset.weighted_vsub Finset.weightedVSub theorem weightedVSub_apply (w : ι → k) (p : ι → P) : s.weightedVSub p w = ∑ i ∈ s, w i • (p i -ᵥ Classical.choice S.nonempty) := by simp [weightedVSub, LinearMap.sum_apply] #align finset.weighted_vsub_apply Finset.weightedVSub_apply theorem weightedVSub_eq_weightedVSubOfPoint_of_sum_eq_zero (w : ι → k) (p : ι → P) (h : ∑ i ∈ s, w i = 0) (b : P) : s.weightedVSub p w = s.weightedVSubOfPoint p b w := s.weightedVSubOfPoint_eq_of_sum_eq_zero w p h _ _ #align finset.weighted_vsub_eq_weighted_vsub_of_point_of_sum_eq_zero Finset.weightedVSub_eq_weightedVSubOfPoint_of_sum_eq_zero @[simp] theorem weightedVSub_apply_const (w : ι → k) (p : P) (h : ∑ i ∈ s, w i = 0) : s.weightedVSub (fun _ => p) w = 0 := by rw [weightedVSub, weightedVSubOfPoint_apply_const, h, zero_smul] #align finset.weighted_vsub_apply_const Finset.weightedVSub_apply_const @[simp] theorem weightedVSub_empty (w : ι → k) (p : ι → P) : (∅ : Finset ι).weightedVSub p w = (0 : V) := by simp [weightedVSub_apply] #align finset.weighted_vsub_empty Finset.weightedVSub_empty theorem weightedVSub_congr {w₁ w₂ : ι → k} (hw : ∀ i ∈ s, w₁ i = w₂ i) {p₁ p₂ : ι → P} (hp : ∀ i ∈ s, p₁ i = p₂ i) : s.weightedVSub p₁ w₁ = s.weightedVSub p₂ w₂ := s.weightedVSubOfPoint_congr hw hp _ #align finset.weighted_vsub_congr Finset.weightedVSub_congr theorem weightedVSub_indicator_subset (w : ι → k) (p : ι → P) {s₁ s₂ : Finset ι} (h : s₁ ⊆ s₂) : s₁.weightedVSub p w = s₂.weightedVSub p (Set.indicator (↑s₁) w) := weightedVSubOfPoint_indicator_subset _ _ _ h #align finset.weighted_vsub_indicator_subset Finset.weightedVSub_indicator_subset theorem weightedVSub_map (e : ι₂ ↪ ι) (w : ι → k) (p : ι → P) : (s₂.map e).weightedVSub p w = s₂.weightedVSub (p ∘ e) (w ∘ e) := s₂.weightedVSubOfPoint_map _ _ _ _ #align finset.weighted_vsub_map Finset.weightedVSub_map theorem sum_smul_vsub_eq_weightedVSub_sub (w : ι → k) (p₁ p₂ : ι → P) : (∑ i ∈ s, w i • (p₁ i -ᵥ p₂ i)) = s.weightedVSub p₁ w - s.weightedVSub p₂ w := s.sum_smul_vsub_eq_weightedVSubOfPoint_sub _ _ _ _ #align finset.sum_smul_vsub_eq_weighted_vsub_sub Finset.sum_smul_vsub_eq_weightedVSub_sub theorem sum_smul_vsub_const_eq_weightedVSub (w : ι → k) (p₁ : ι → P) (p₂ : P) (h : ∑ i ∈ s, w i = 0) : (∑ i ∈ s, w i • (p₁ i -ᵥ p₂)) = s.weightedVSub p₁ w := by rw [sum_smul_vsub_eq_weightedVSub_sub, s.weightedVSub_apply_const _ _ h, sub_zero] #align finset.sum_smul_vsub_const_eq_weighted_vsub Finset.sum_smul_vsub_const_eq_weightedVSub theorem sum_smul_const_vsub_eq_neg_weightedVSub (w : ι → k) (p₂ : ι → P) (p₁ : P) (h : ∑ i ∈ s, w i = 0) : (∑ i ∈ s, w i • (p₁ -ᵥ p₂ i)) = -s.weightedVSub p₂ w := by rw [sum_smul_vsub_eq_weightedVSub_sub, s.weightedVSub_apply_const _ _ h, zero_sub] #align finset.sum_smul_const_vsub_eq_neg_weighted_vsub Finset.sum_smul_const_vsub_eq_neg_weightedVSub theorem weightedVSub_sdiff [DecidableEq ι] {s₂ : Finset ι} (h : s₂ ⊆ s) (w : ι → k) (p : ι → P) : (s \ s₂).weightedVSub p w + s₂.weightedVSub p w = s.weightedVSub p w := s.weightedVSubOfPoint_sdiff h _ _ _ #align finset.weighted_vsub_sdiff Finset.weightedVSub_sdiff theorem weightedVSub_sdiff_sub [DecidableEq ι] {s₂ : Finset ι} (h : s₂ ⊆ s) (w : ι → k) (p : ι → P) : (s \ s₂).weightedVSub p w - s₂.weightedVSub p (-w) = s.weightedVSub p w := s.weightedVSubOfPoint_sdiff_sub h _ _ _ #align finset.weighted_vsub_sdiff_sub Finset.weightedVSub_sdiff_sub theorem weightedVSub_subtype_eq_filter (w : ι → k) (p : ι → P) (pred : ι → Prop) [DecidablePred pred] : ((s.subtype pred).weightedVSub (fun i => p i) fun i => w i) = (s.filter pred).weightedVSub p w := s.weightedVSubOfPoint_subtype_eq_filter _ _ _ _ #align finset.weighted_vsub_subtype_eq_filter Finset.weightedVSub_subtype_eq_filter theorem weightedVSub_filter_of_ne (w : ι → k) (p : ι → P) {pred : ι → Prop} [DecidablePred pred] (h : ∀ i ∈ s, w i ≠ 0 → pred i) : (s.filter pred).weightedVSub p w = s.weightedVSub p w := s.weightedVSubOfPoint_filter_of_ne _ _ _ h #align finset.weighted_vsub_filter_of_ne Finset.weightedVSub_filter_of_ne theorem weightedVSub_const_smul (w : ι → k) (p : ι → P) (c : k) : s.weightedVSub p (c • w) = c • s.weightedVSub p w := s.weightedVSubOfPoint_const_smul _ _ _ _ #align finset.weighted_vsub_const_smul Finset.weightedVSub_const_smul instance : AffineSpace (ι → k) (ι → k) := Pi.instAddTorsor variable (k) def affineCombination (p : ι → P) : (ι → k) →ᵃ[k] P where toFun w := s.weightedVSubOfPoint p (Classical.choice S.nonempty) w +ᵥ Classical.choice S.nonempty linear := s.weightedVSub p map_vadd' w₁ w₂ := by simp_rw [vadd_vadd, weightedVSub, vadd_eq_add, LinearMap.map_add] #align finset.affine_combination Finset.affineCombination @[simp] theorem affineCombination_linear (p : ι → P) : (s.affineCombination k p).linear = s.weightedVSub p := rfl #align finset.affine_combination_linear Finset.affineCombination_linear variable {k} theorem affineCombination_apply (w : ι → k) (p : ι → P) : (s.affineCombination k p) w = s.weightedVSubOfPoint p (Classical.choice S.nonempty) w +ᵥ Classical.choice S.nonempty := rfl #align finset.affine_combination_apply Finset.affineCombination_apply @[simp] theorem affineCombination_apply_const (w : ι → k) (p : P) (h : ∑ i ∈ s, w i = 1) : s.affineCombination k (fun _ => p) w = p := by rw [affineCombination_apply, s.weightedVSubOfPoint_apply_const, h, one_smul, vsub_vadd] #align finset.affine_combination_apply_const Finset.affineCombination_apply_const theorem affineCombination_congr {w₁ w₂ : ι → k} (hw : ∀ i ∈ s, w₁ i = w₂ i) {p₁ p₂ : ι → P} (hp : ∀ i ∈ s, p₁ i = p₂ i) : s.affineCombination k p₁ w₁ = s.affineCombination k p₂ w₂ := by simp_rw [affineCombination_apply, s.weightedVSubOfPoint_congr hw hp] #align finset.affine_combination_congr Finset.affineCombination_congr theorem affineCombination_eq_weightedVSubOfPoint_vadd_of_sum_eq_one (w : ι → k) (p : ι → P) (h : ∑ i ∈ s, w i = 1) (b : P) : s.affineCombination k p w = s.weightedVSubOfPoint p b w +ᵥ b := s.weightedVSubOfPoint_vadd_eq_of_sum_eq_one w p h _ _ #align finset.affine_combination_eq_weighted_vsub_of_point_vadd_of_sum_eq_one Finset.affineCombination_eq_weightedVSubOfPoint_vadd_of_sum_eq_one theorem weightedVSub_vadd_affineCombination (w₁ w₂ : ι → k) (p : ι → P) : s.weightedVSub p w₁ +ᵥ s.affineCombination k p w₂ = s.affineCombination k p (w₁ + w₂) := by rw [← vadd_eq_add, AffineMap.map_vadd, affineCombination_linear] #align finset.weighted_vsub_vadd_affine_combination Finset.weightedVSub_vadd_affineCombination theorem affineCombination_vsub (w₁ w₂ : ι → k) (p : ι → P) : s.affineCombination k p w₁ -ᵥ s.affineCombination k p w₂ = s.weightedVSub p (w₁ - w₂) := by rw [← AffineMap.linearMap_vsub, affineCombination_linear, vsub_eq_sub] #align finset.affine_combination_vsub Finset.affineCombination_vsub theorem attach_affineCombination_of_injective [DecidableEq P] (s : Finset P) (w : P → k) (f : s → P) (hf : Function.Injective f) : s.attach.affineCombination k f (w ∘ f) = (image f univ).affineCombination k id w := by simp only [affineCombination, weightedVSubOfPoint_apply, id, vadd_right_cancel_iff, Function.comp_apply, AffineMap.coe_mk] let g₁ : s → V := fun i => w (f i) • (f i -ᵥ Classical.choice S.nonempty) let g₂ : P → V := fun i => w i • (i -ᵥ Classical.choice S.nonempty) change univ.sum g₁ = (image f univ).sum g₂ have hgf : g₁ = g₂ ∘ f := by ext simp rw [hgf, sum_image] · simp only [Function.comp_apply] · exact fun _ _ _ _ hxy => hf hxy #align finset.attach_affine_combination_of_injective Finset.attach_affineCombination_of_injective theorem attach_affineCombination_coe (s : Finset P) (w : P → k) : s.attach.affineCombination k ((↑) : s → P) (w ∘ (↑)) = s.affineCombination k id w := by classical rw [attach_affineCombination_of_injective s w ((↑) : s → P) Subtype.coe_injective, univ_eq_attach, attach_image_val] #align finset.attach_affine_combination_coe Finset.attach_affineCombination_coe @[simp] theorem weightedVSub_eq_linear_combination {ι} (s : Finset ι) {w : ι → k} {p : ι → V} (hw : s.sum w = 0) : s.weightedVSub p w = ∑ i ∈ s, w i • p i := by simp [s.weightedVSub_apply, vsub_eq_sub, smul_sub, ← Finset.sum_smul, hw] #align finset.weighted_vsub_eq_linear_combination Finset.weightedVSub_eq_linear_combination @[simp] theorem affineCombination_eq_linear_combination (s : Finset ι) (p : ι → V) (w : ι → k) (hw : ∑ i ∈ s, w i = 1) : s.affineCombination k p w = ∑ i ∈ s, w i • p i := by simp [s.affineCombination_eq_weightedVSubOfPoint_vadd_of_sum_eq_one w p hw 0] #align finset.affine_combination_eq_linear_combination Finset.affineCombination_eq_linear_combination @[simp]	Mathlib/LinearAlgebra/AffineSpace/Combination.lean	472	482	theorem affineCombination_of_eq_one_of_eq_zero (w : ι → k) (p : ι → P) {i : ι} (his : i ∈ s) (hwi : w i = 1) (hw0 : ∀ i2 ∈ s, i2 ≠ i → w i2 = 0) : s.affineCombination k p w = p i := by	have h1 : ∑ i ∈ s, w i = 1 := hwi ▸ sum_eq_single i hw0 fun h => False.elim (h his) rw [s.affineCombination_eq_weightedVSubOfPoint_vadd_of_sum_eq_one w p h1 (p i), weightedVSubOfPoint_apply] convert zero_vadd V (p i) refine sum_eq_zero ?_ intro i2 hi2 by_cases h : i2 = i · simp [h] · simp [hw0 i2 hi2 h]
import Mathlib.Data.Vector.Basic import Mathlib.Data.Vector.Snoc set_option autoImplicit true namespace Vector section Fold section Binary variable (xs : Vector α n) (ys : Vector β n) @[simp] theorem mapAccumr₂_mapAccumr_left (f₁ : γ → β → σ₁ → σ₁ × ζ) (f₂ : α → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ (mapAccumr f₂ xs s₂).snd ys s₁) = let m := (mapAccumr₂ (fun x y s => let r₂ := f₂ x s.snd let r₁ := f₁ r₂.snd y s.fst ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂)) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem map₂_map_left (f₁ : γ → β → ζ) (f₂ : α → γ) : map₂ f₁ (map f₂ xs) ys = map₂ (fun x y => f₁ (f₂ x) y) xs ys := by induction xs, ys using Vector.revInductionOn₂ <;> simp_all @[simp] theorem mapAccumr₂_mapAccumr_right (f₁ : α → γ → σ₁ → σ₁ × ζ) (f₂ : β → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ xs (mapAccumr f₂ ys s₂).snd s₁) = let m := (mapAccumr₂ (fun x y s => let r₂ := f₂ y s.snd let r₁ := f₁ x r₂.snd s.fst ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂)) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem map₂_map_right (f₁ : α → γ → ζ) (f₂ : β → γ) : map₂ f₁ xs (map f₂ ys) = map₂ (fun x y => f₁ x (f₂ y)) xs ys := by induction xs, ys using Vector.revInductionOn₂ <;> simp_all @[simp] theorem mapAccumr_mapAccumr₂ (f₁ : γ → σ₁ → σ₁ × ζ) (f₂ : α → β → σ₂ → σ₂ × γ) : (mapAccumr f₁ (mapAccumr₂ f₂ xs ys s₂).snd s₁) = let m := mapAccumr₂ (fun x y s => let r₂ := f₂ x y s.snd let r₁ := f₁ r₂.snd s.fst ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂) (m.fst.fst, m.snd) := by induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all @[simp] theorem map_map₂ (f₁ : γ → ζ) (f₂ : α → β → γ) : map f₁ (map₂ f₂ xs ys) = map₂ (fun x y => f₁ <\| f₂ x y) xs ys := by induction xs, ys using Vector.revInductionOn₂ <;> simp_all @[simp]	Mathlib/Data/Vector/MapLemmas.lean	108	117	theorem mapAccumr₂_mapAccumr₂_left_left (f₁ : γ → α → σ₁ → σ₁ × φ) (f₂ : α → β → σ₂ → σ₂ × γ) : (mapAccumr₂ f₁ (mapAccumr₂ f₂ xs ys s₂).snd xs s₁) = let m := mapAccumr₂ (fun x y (s₁, s₂) => let r₂ := f₂ x y s₂ let r₁ := f₁ r₂.snd x s₁ ((r₁.fst, r₂.fst), r₁.snd) ) xs ys (s₁, s₂) (m.fst.fst, m.snd) := by	induction xs, ys using Vector.revInductionOn₂ generalizing s₁ s₂ <;> simp_all
import Mathlib.LinearAlgebra.FiniteDimensional import Mathlib.MeasureTheory.Group.Pointwise import Mathlib.MeasureTheory.Measure.Lebesgue.Basic import Mathlib.MeasureTheory.Measure.Haar.Basic import Mathlib.MeasureTheory.Measure.Doubling import Mathlib.MeasureTheory.Constructions.BorelSpace.Metric #align_import measure_theory.measure.lebesgue.eq_haar from "leanprover-community/mathlib"@"fd5edc43dc4f10b85abfe544b88f82cf13c5f844" assert_not_exists MeasureTheory.integral open TopologicalSpace Set Filter Metric Bornology open scoped ENNReal Pointwise Topology NNReal def TopologicalSpace.PositiveCompacts.Icc01 : PositiveCompacts ℝ where carrier := Icc 0 1 isCompact' := isCompact_Icc interior_nonempty' := by simp_rw [interior_Icc, nonempty_Ioo, zero_lt_one] #align topological_space.positive_compacts.Icc01 TopologicalSpace.PositiveCompacts.Icc01 universe u def TopologicalSpace.PositiveCompacts.piIcc01 (ι : Type) [Finite ι] : PositiveCompacts (ι → ℝ) where carrier := pi univ fun _ => Icc 0 1 isCompact' := isCompact_univ_pi fun _ => isCompact_Icc interior_nonempty' := by simp only [interior_pi_set, Set.toFinite, interior_Icc, univ_pi_nonempty_iff, nonempty_Ioo, imp_true_iff, zero_lt_one] #align topological_space.positive_compacts.pi_Icc01 TopologicalSpace.PositiveCompacts.piIcc01 theorem Basis.parallelepiped_basisFun (ι : Type) [Fintype ι] : (Pi.basisFun ℝ ι).parallelepiped = TopologicalSpace.PositiveCompacts.piIcc01 ι := SetLike.coe_injective <\| by refine Eq.trans ?_ ((uIcc_of_le ?_).trans (Set.pi_univ_Icc _ _).symm) · classical convert parallelepiped_single (ι := ι) 1 · exact zero_le_one #align basis.parallelepiped_basis_fun Basis.parallelepiped_basisFun theorem Basis.parallelepiped_eq_map {ι E : Type} [Fintype ι] [NormedAddCommGroup E] [NormedSpace ℝ E] (b : Basis ι ℝ E) : b.parallelepiped = (PositiveCompacts.piIcc01 ι).map b.equivFun.symm b.equivFunL.symm.continuous b.equivFunL.symm.isOpenMap := by classical rw [← Basis.parallelepiped_basisFun, ← Basis.parallelepiped_map] congr with x simp open MeasureTheory MeasureTheory.Measure theorem Basis.map_addHaar {ι E F : Type} [Fintype ι] [NormedAddCommGroup E] [NormedAddCommGroup F] [NormedSpace ℝ E] [NormedSpace ℝ F] [MeasurableSpace E] [MeasurableSpace F] [BorelSpace E] [BorelSpace F] [SecondCountableTopology F] [SigmaCompactSpace F] (b : Basis ι ℝ E) (f : E ≃L[ℝ] F) : map f b.addHaar = (b.map f.toLinearEquiv).addHaar := by have : IsAddHaarMeasure (map f b.addHaar) := AddEquiv.isAddHaarMeasure_map b.addHaar f.toAddEquiv f.continuous f.symm.continuous rw [eq_comm, Basis.addHaar_eq_iff, Measure.map_apply f.continuous.measurable (PositiveCompacts.isCompact _).measurableSet, Basis.coe_parallelepiped, Basis.coe_map] erw [← image_parallelepiped, f.toEquiv.preimage_image, addHaar_self] namespace MeasureTheory open Measure TopologicalSpace.PositiveCompacts FiniteDimensional theorem addHaarMeasure_eq_volume : addHaarMeasure Icc01 = volume := by convert (addHaarMeasure_unique volume Icc01).symm; simp [Icc01] #align measure_theory.add_haar_measure_eq_volume MeasureTheory.addHaarMeasure_eq_volume theorem addHaarMeasure_eq_volume_pi (ι : Type) [Fintype ι] : addHaarMeasure (piIcc01 ι) = volume := by convert (addHaarMeasure_unique volume (piIcc01 ι)).symm simp only [piIcc01, volume_pi_pi fun _ => Icc (0 : ℝ) 1, PositiveCompacts.coe_mk, Compacts.coe_mk, Finset.prod_const_one, ENNReal.ofReal_one, Real.volume_Icc, one_smul, sub_zero] #align measure_theory.add_haar_measure_eq_volume_pi MeasureTheory.addHaarMeasure_eq_volume_pi -- Porting note (#11215): TODO: remove this instance? instance isAddHaarMeasure_volume_pi (ι : Type) [Fintype ι] : IsAddHaarMeasure (volume : Measure (ι → ℝ)) := inferInstance #align measure_theory.is_add_haar_measure_volume_pi MeasureTheory.isAddHaarMeasure_volume_pi namespace Measure theorem addHaar_eq_zero_of_disjoint_translates_aux {E : Type} [NormedAddCommGroup E] [NormedSpace ℝ E] [MeasurableSpace E] [BorelSpace E] [FiniteDimensional ℝ E] (μ : Measure E) [IsAddHaarMeasure μ] {s : Set E} (u : ℕ → E) (sb : IsBounded s) (hu : IsBounded (range u)) (hs : Pairwise (Disjoint on fun n => {u n} + s)) (h's : MeasurableSet s) : μ s = 0 := by by_contra h apply lt_irrefl ∞ calc ∞ = ∑' _ : ℕ, μ s := (ENNReal.tsum_const_eq_top_of_ne_zero h).symm _ = ∑' n : ℕ, μ ({u n} + s) := by congr 1; ext1 n; simp only [image_add_left, measure_preimage_add, singleton_add] _ = μ (⋃ n, {u n} + s) := Eq.symm <\| measure_iUnion hs fun n => by simpa only [image_add_left, singleton_add] using measurable_id.const_add _ h's _ = μ (range u + s) := by rw [← iUnion_add, iUnion_singleton_eq_range] _ < ∞ := (hu.add sb).measure_lt_top #align measure_theory.measure.add_haar_eq_zero_of_disjoint_translates_aux MeasureTheory.Measure.addHaar_eq_zero_of_disjoint_translates_aux theorem addHaar_eq_zero_of_disjoint_translates {E : Type} [NormedAddCommGroup E] [NormedSpace ℝ E] [MeasurableSpace E] [BorelSpace E] [FiniteDimensional ℝ E] (μ : Measure E) [IsAddHaarMeasure μ] {s : Set E} (u : ℕ → E) (hu : IsBounded (range u)) (hs : Pairwise (Disjoint on fun n => {u n} + s)) (h's : MeasurableSet s) : μ s = 0 := by suffices H : ∀ R, μ (s ∩ closedBall 0 R) = 0 by apply le_antisymm _ (zero_le _) calc μ s ≤ ∑' n : ℕ, μ (s ∩ closedBall 0 n) := by conv_lhs => rw [← iUnion_inter_closedBall_nat s 0] exact measure_iUnion_le _ _ = 0 := by simp only [H, tsum_zero] intro R apply addHaar_eq_zero_of_disjoint_translates_aux μ u (isBounded_closedBall.subset inter_subset_right) hu _ (h's.inter measurableSet_closedBall) refine pairwise_disjoint_mono hs fun n => ?_ exact add_subset_add Subset.rfl inter_subset_left #align measure_theory.measure.add_haar_eq_zero_of_disjoint_translates MeasureTheory.Measure.addHaar_eq_zero_of_disjoint_translates theorem addHaar_submodule {E : Type} [NormedAddCommGroup E] [NormedSpace ℝ E] [MeasurableSpace E] [BorelSpace E] [FiniteDimensional ℝ E] (μ : Measure E) [IsAddHaarMeasure μ] (s : Submodule ℝ E) (hs : s ≠ ⊤) : μ s = 0 := by obtain ⟨x, hx⟩ : ∃ x, x ∉ s := by simpa only [Submodule.eq_top_iff', not_exists, Ne, not_forall] using hs obtain ⟨c, cpos, cone⟩ : ∃ c : ℝ, 0 < c ∧ c < 1 := ⟨1 / 2, by norm_num, by norm_num⟩ have A : IsBounded (range fun n : ℕ => c ^ n • x) := have : Tendsto (fun n : ℕ => c ^ n • x) atTop (𝓝 ((0 : ℝ) • x)) := (tendsto_pow_atTop_nhds_zero_of_lt_one cpos.le cone).smul_const x isBounded_range_of_tendsto _ this apply addHaar_eq_zero_of_disjoint_translates μ _ A _ (Submodule.closed_of_finiteDimensional s).measurableSet intro m n hmn simp only [Function.onFun, image_add_left, singleton_add, disjoint_left, mem_preimage, SetLike.mem_coe] intro y hym hyn have A : (c ^ n - c ^ m) • x ∈ s := by convert s.sub_mem hym hyn using 1 simp only [sub_smul, neg_sub_neg, add_sub_add_right_eq_sub] have H : c ^ n - c ^ m ≠ 0 := by simpa only [sub_eq_zero, Ne] using (pow_right_strictAnti cpos cone).injective.ne hmn.symm have : x ∈ s := by convert s.smul_mem (c ^ n - c ^ m)⁻¹ A rw [smul_smul, inv_mul_cancel H, one_smul] exact hx this #align measure_theory.measure.add_haar_submodule MeasureTheory.Measure.addHaar_submodule theorem addHaar_affineSubspace {E : Type} [NormedAddCommGroup E] [NormedSpace ℝ E] [MeasurableSpace E] [BorelSpace E] [FiniteDimensional ℝ E] (μ : Measure E) [IsAddHaarMeasure μ] (s : AffineSubspace ℝ E) (hs : s ≠ ⊤) : μ s = 0 := by rcases s.eq_bot_or_nonempty with (rfl \| hne) · rw [AffineSubspace.bot_coe, measure_empty] rw [Ne, ← AffineSubspace.direction_eq_top_iff_of_nonempty hne] at hs rcases hne with ⟨x, hx : x ∈ s⟩ simpa only [AffineSubspace.coe_direction_eq_vsub_set_right hx, vsub_eq_sub, sub_eq_add_neg, image_add_right, neg_neg, measure_preimage_add_right] using addHaar_submodule μ s.direction hs #align measure_theory.measure.add_haar_affine_subspace MeasureTheory.Measure.addHaar_affineSubspace theorem map_linearMap_addHaar_pi_eq_smul_addHaar {ι : Type} [Finite ι] {f : (ι → ℝ) →ₗ[ℝ] ι → ℝ} (hf : LinearMap.det f ≠ 0) (μ : Measure (ι → ℝ)) [IsAddHaarMeasure μ] : Measure.map f μ = ENNReal.ofReal (abs (LinearMap.det f)⁻¹) • μ := by cases nonempty_fintype ι have := addHaarMeasure_unique μ (piIcc01 ι) rw [this, addHaarMeasure_eq_volume_pi, Measure.map_smul, Real.map_linearMap_volume_pi_eq_smul_volume_pi hf, smul_comm] #align measure_theory.measure.map_linear_map_add_haar_pi_eq_smul_add_haar MeasureTheory.Measure.map_linearMap_addHaar_pi_eq_smul_addHaar variable {E : Type} [NormedAddCommGroup E] [NormedSpace ℝ E] [MeasurableSpace E] [BorelSpace E] [FiniteDimensional ℝ E] (μ : Measure E) [IsAddHaarMeasure μ] {F : Type} [NormedAddCommGroup F] [NormedSpace ℝ F] [CompleteSpace F] theorem map_linearMap_addHaar_eq_smul_addHaar {f : E →ₗ[ℝ] E} (hf : LinearMap.det f ≠ 0) : Measure.map f μ = ENNReal.ofReal \|(LinearMap.det f)⁻¹\| • μ := by -- we reduce to the case of `E = ι → ℝ`, for which we have already proved the result using -- matrices in `map_linearMap_addHaar_pi_eq_smul_addHaar`. let ι := Fin (finrank ℝ E) haveI : FiniteDimensional ℝ (ι → ℝ) := by infer_instance have : finrank ℝ E = finrank ℝ (ι → ℝ) := by simp [ι] have e : E ≃ₗ[ℝ] ι → ℝ := LinearEquiv.ofFinrankEq E (ι → ℝ) this -- next line is to avoid `g` getting reduced by `simp`. obtain ⟨g, hg⟩ : ∃ g, g = (e : E →ₗ[ℝ] ι → ℝ).comp (f.comp (e.symm : (ι → ℝ) →ₗ[ℝ] E)) := ⟨_, rfl⟩ have gdet : LinearMap.det g = LinearMap.det f := by rw [hg]; exact LinearMap.det_conj f e rw [← gdet] at hf ⊢ have fg : f = (e.symm : (ι → ℝ) →ₗ[ℝ] E).comp (g.comp (e : E →ₗ[ℝ] ι → ℝ)) := by ext x simp only [LinearEquiv.coe_coe, Function.comp_apply, LinearMap.coe_comp, LinearEquiv.symm_apply_apply, hg] simp only [fg, LinearEquiv.coe_coe, LinearMap.coe_comp] have Ce : Continuous e := (e : E →ₗ[ℝ] ι → ℝ).continuous_of_finiteDimensional have Cg : Continuous g := LinearMap.continuous_of_finiteDimensional g have Cesymm : Continuous e.symm := (e.symm : (ι → ℝ) →ₗ[ℝ] E).continuous_of_finiteDimensional rw [← map_map Cesymm.measurable (Cg.comp Ce).measurable, ← map_map Cg.measurable Ce.measurable] haveI : IsAddHaarMeasure (map e μ) := (e : E ≃+ (ι → ℝ)).isAddHaarMeasure_map μ Ce Cesymm have ecomp : e.symm ∘ e = id := by ext x; simp only [id, Function.comp_apply, LinearEquiv.symm_apply_apply] rw [map_linearMap_addHaar_pi_eq_smul_addHaar hf (map e μ), Measure.map_smul, map_map Cesymm.measurable Ce.measurable, ecomp, Measure.map_id] #align measure_theory.measure.map_linear_map_add_haar_eq_smul_add_haar MeasureTheory.Measure.map_linearMap_addHaar_eq_smul_addHaar @[simp] theorem addHaar_preimage_linearMap {f : E →ₗ[ℝ] E} (hf : LinearMap.det f ≠ 0) (s : Set E) : μ (f ⁻¹' s) = ENNReal.ofReal \|(LinearMap.det f)⁻¹\| μ s := calc μ (f ⁻¹' s) = Measure.map f μ s := ((f.equivOfDetNeZero hf).toContinuousLinearEquiv.toHomeomorph.toMeasurableEquiv.map_apply s).symm _ = ENNReal.ofReal \|(LinearMap.det f)⁻¹\| * μ s := by rw [map_linearMap_addHaar_eq_smul_addHaar μ hf]; rfl #align measure_theory.measure.add_haar_preimage_linear_map MeasureTheory.Measure.addHaar_preimage_linearMap @[simp] theorem addHaar_preimage_continuousLinearMap {f : E →L[ℝ] E} (hf : LinearMap.det (f : E →ₗ[ℝ] E) ≠ 0) (s : Set E) : μ (f ⁻¹' s) = ENNReal.ofReal (abs (LinearMap.det (f : E →ₗ[ℝ] E))⁻¹) * μ s := addHaar_preimage_linearMap μ hf s #align measure_theory.measure.add_haar_preimage_continuous_linear_map MeasureTheory.Measure.addHaar_preimage_continuousLinearMap @[simp] theorem addHaar_preimage_linearEquiv (f : E ≃ₗ[ℝ] E) (s : Set E) : μ (f ⁻¹' s) = ENNReal.ofReal \|LinearMap.det (f.symm : E →ₗ[ℝ] E)\| * μ s := by have A : LinearMap.det (f : E →ₗ[ℝ] E) ≠ 0 := (LinearEquiv.isUnit_det' f).ne_zero convert addHaar_preimage_linearMap μ A s simp only [LinearEquiv.det_coe_symm] #align measure_theory.measure.add_haar_preimage_linear_equiv MeasureTheory.Measure.addHaar_preimage_linearEquiv @[simp] theorem addHaar_preimage_continuousLinearEquiv (f : E ≃L[ℝ] E) (s : Set E) : μ (f ⁻¹' s) = ENNReal.ofReal \|LinearMap.det (f.symm : E →ₗ[ℝ] E)\| * μ s := addHaar_preimage_linearEquiv μ _ s #align measure_theory.measure.add_haar_preimage_continuous_linear_equiv MeasureTheory.Measure.addHaar_preimage_continuousLinearEquiv @[simp] theorem addHaar_image_linearMap (f : E →ₗ[ℝ] E) (s : Set E) : μ (f '' s) = ENNReal.ofReal \|LinearMap.det f\| * μ s := by rcases ne_or_eq (LinearMap.det f) 0 with (hf \| hf) · let g := (f.equivOfDetNeZero hf).toContinuousLinearEquiv change μ (g '' s) = _ rw [ContinuousLinearEquiv.image_eq_preimage g s, addHaar_preimage_continuousLinearEquiv] congr · simp only [hf, zero_mul, ENNReal.ofReal_zero, abs_zero] have : μ (LinearMap.range f) = 0 := addHaar_submodule μ _ (LinearMap.range_lt_top_of_det_eq_zero hf).ne exact le_antisymm (le_trans (measure_mono (image_subset_range _ _)) this.le) (zero_le _) #align measure_theory.measure.add_haar_image_linear_map MeasureTheory.Measure.addHaar_image_linearMap @[simp] theorem addHaar_image_continuousLinearMap (f : E →L[ℝ] E) (s : Set E) : μ (f '' s) = ENNReal.ofReal \|LinearMap.det (f : E →ₗ[ℝ] E)\| * μ s := addHaar_image_linearMap μ _ s #align measure_theory.measure.add_haar_image_continuous_linear_map MeasureTheory.Measure.addHaar_image_continuousLinearMap @[simp] theorem addHaar_image_continuousLinearEquiv (f : E ≃L[ℝ] E) (s : Set E) : μ (f '' s) = ENNReal.ofReal \|LinearMap.det (f : E →ₗ[ℝ] E)\| * μ s := μ.addHaar_image_linearMap (f : E →ₗ[ℝ] E) s #align measure_theory.measure.add_haar_image_continuous_linear_equiv MeasureTheory.Measure.addHaar_image_continuousLinearEquiv theorem LinearMap.quasiMeasurePreserving (f : E →ₗ[ℝ] E) (hf : LinearMap.det f ≠ 0) : QuasiMeasurePreserving f μ μ := by refine ⟨f.continuous_of_finiteDimensional.measurable, ?_⟩ rw [map_linearMap_addHaar_eq_smul_addHaar μ hf] exact smul_absolutelyContinuous theorem ContinuousLinearMap.quasiMeasurePreserving (f : E →L[ℝ] E) (hf : f.det ≠ 0) : QuasiMeasurePreserving f μ μ := LinearMap.quasiMeasurePreserving μ (f : E →ₗ[ℝ] E) hf theorem map_addHaar_smul {r : ℝ} (hr : r ≠ 0) : Measure.map (r • ·) μ = ENNReal.ofReal (abs (r ^ finrank ℝ E)⁻¹) • μ := by let f : E →ₗ[ℝ] E := r • (1 : E →ₗ[ℝ] E) change Measure.map f μ = _ have hf : LinearMap.det f ≠ 0 := by simp only [f, mul_one, LinearMap.det_smul, Ne, MonoidHom.map_one] intro h exact hr (pow_eq_zero h) simp only [f, map_linearMap_addHaar_eq_smul_addHaar μ hf, mul_one, LinearMap.det_smul, map_one] #align measure_theory.measure.map_add_haar_smul MeasureTheory.Measure.map_addHaar_smul theorem quasiMeasurePreserving_smul {r : ℝ} (hr : r ≠ 0) : QuasiMeasurePreserving (r • ·) μ μ := by refine ⟨measurable_const_smul r, ?_⟩ rw [map_addHaar_smul μ hr] exact smul_absolutelyContinuous @[simp] theorem addHaar_preimage_smul {r : ℝ} (hr : r ≠ 0) (s : Set E) : μ ((r • ·) ⁻¹' s) = ENNReal.ofReal (abs (r ^ finrank ℝ E)⁻¹) * μ s := calc μ ((r • ·) ⁻¹' s) = Measure.map (r • ·) μ s := ((Homeomorph.smul (isUnit_iff_ne_zero.2 hr).unit).toMeasurableEquiv.map_apply s).symm _ = ENNReal.ofReal (abs (r ^ finrank ℝ E)⁻¹) * μ s := by rw [map_addHaar_smul μ hr, coe_smul, Pi.smul_apply, smul_eq_mul] #align measure_theory.measure.add_haar_preimage_smul MeasureTheory.Measure.addHaar_preimage_smul @[simp] theorem addHaar_smul (r : ℝ) (s : Set E) : μ (r • s) = ENNReal.ofReal (abs (r ^ finrank ℝ E)) * μ s := by rcases ne_or_eq r 0 with (h \| rfl) · rw [← preimage_smul_inv₀ h, addHaar_preimage_smul μ (inv_ne_zero h), inv_pow, inv_inv] rcases eq_empty_or_nonempty s with (rfl \| hs) · simp only [measure_empty, mul_zero, smul_set_empty] rw [zero_smul_set hs, ← singleton_zero] by_cases h : finrank ℝ E = 0 · haveI : Subsingleton E := finrank_zero_iff.1 h simp only [h, one_mul, ENNReal.ofReal_one, abs_one, Subsingleton.eq_univ_of_nonempty hs, pow_zero, Subsingleton.eq_univ_of_nonempty (singleton_nonempty (0 : E))] · haveI : Nontrivial E := nontrivial_of_finrank_pos (bot_lt_iff_ne_bot.2 h) simp only [h, zero_mul, ENNReal.ofReal_zero, abs_zero, Ne, not_false_iff, zero_pow, measure_singleton] #align measure_theory.measure.add_haar_smul MeasureTheory.Measure.addHaar_smul theorem addHaar_smul_of_nonneg {r : ℝ} (hr : 0 ≤ r) (s : Set E) : μ (r • s) = ENNReal.ofReal (r ^ finrank ℝ E) * μ s := by rw [addHaar_smul, abs_pow, abs_of_nonneg hr] #align measure_theory.measure.add_haar_smul_of_nonneg MeasureTheory.Measure.addHaar_smul_of_nonneg variable {μ} {s : Set E} -- Note: We might want to rename this once we acquire the lemma corresponding to -- `MeasurableSet.const_smul` theorem NullMeasurableSet.const_smul (hs : NullMeasurableSet s μ) (r : ℝ) : NullMeasurableSet (r • s) μ := by obtain rfl \| hs' := s.eq_empty_or_nonempty · simp obtain rfl \| hr := eq_or_ne r 0 · simpa [zero_smul_set hs'] using nullMeasurableSet_singleton _ obtain ⟨t, ht, hst⟩ := hs refine ⟨_, ht.const_smul_of_ne_zero hr, ?_⟩ rw [← measure_symmDiff_eq_zero_iff] at hst ⊢ rw [← smul_set_symmDiff₀ hr, addHaar_smul μ, hst, mul_zero] #align measure_theory.measure.null_measurable_set.const_smul MeasureTheory.Measure.NullMeasurableSet.const_smul variable (μ) @[simp] theorem addHaar_image_homothety (x : E) (r : ℝ) (s : Set E) : μ (AffineMap.homothety x r '' s) = ENNReal.ofReal (abs (r ^ finrank ℝ E)) * μ s := calc μ (AffineMap.homothety x r '' s) = μ ((fun y => y + x) '' (r • (fun y => y + -x) '' s)) := by simp only [← image_smul, image_image, ← sub_eq_add_neg]; rfl _ = ENNReal.ofReal (abs (r ^ finrank ℝ E)) * μ s := by simp only [image_add_right, measure_preimage_add_right, addHaar_smul] #align measure_theory.measure.add_haar_image_homothety MeasureTheory.Measure.addHaar_image_homothety theorem addHaar_ball_center {E : Type} [NormedAddCommGroup E] [MeasurableSpace E] [BorelSpace E] (μ : Measure E) [IsAddHaarMeasure μ] (x : E) (r : ℝ) : μ (ball x r) = μ (ball (0 : E) r) := by have : ball (0 : E) r = (x + ·) ⁻¹' ball x r := by simp [preimage_add_ball] rw [this, measure_preimage_add] #align measure_theory.measure.add_haar_ball_center MeasureTheory.Measure.addHaar_ball_center theorem addHaar_closedBall_center {E : Type} [NormedAddCommGroup E] [MeasurableSpace E] [BorelSpace E] (μ : Measure E) [IsAddHaarMeasure μ] (x : E) (r : ℝ) : μ (closedBall x r) = μ (closedBall (0 : E) r) := by have : closedBall (0 : E) r = (x + ·) ⁻¹' closedBall x r := by simp [preimage_add_closedBall] rw [this, measure_preimage_add] #align measure_theory.measure.add_haar_closed_ball_center MeasureTheory.Measure.addHaar_closedBall_center	Mathlib/MeasureTheory/Measure/Lebesgue/EqHaar.lean	454	458	theorem addHaar_ball_mul_of_pos (x : E) {r : ℝ} (hr : 0 < r) (s : ℝ) : μ (ball x (r * s)) = ENNReal.ofReal (r ^ finrank ℝ E) * μ (ball 0 s) := by	have : ball (0 : E) (r * s) = r • ball (0 : E) s := by simp only [_root_.smul_ball hr.ne' (0 : E) s, Real.norm_eq_abs, abs_of_nonneg hr.le, smul_zero] simp only [this, addHaar_smul, abs_of_nonneg hr.le, addHaar_ball_center, abs_pow]
import Mathlib.MeasureTheory.Integral.Lebesgue open Set hiding restrict restrict_apply open Filter ENNReal NNReal MeasureTheory.Measure namespace MeasureTheory variable {α : Type*} {m0 : MeasurableSpace α} {μ : Measure α} noncomputable def Measure.withDensity {m : MeasurableSpace α} (μ : Measure α) (f : α → ℝ≥0∞) : Measure α := Measure.ofMeasurable (fun s _ => ∫⁻ a in s, f a ∂μ) (by simp) fun s hs hd => lintegral_iUnion hs hd _ #align measure_theory.measure.with_density MeasureTheory.Measure.withDensity @[simp] theorem withDensity_apply (f : α → ℝ≥0∞) {s : Set α} (hs : MeasurableSet s) : μ.withDensity f s = ∫⁻ a in s, f a ∂μ := Measure.ofMeasurable_apply s hs #align measure_theory.with_density_apply MeasureTheory.withDensity_apply theorem withDensity_apply_le (f : α → ℝ≥0∞) (s : Set α) : ∫⁻ a in s, f a ∂μ ≤ μ.withDensity f s := by let t := toMeasurable (μ.withDensity f) s calc ∫⁻ a in s, f a ∂μ ≤ ∫⁻ a in t, f a ∂μ := lintegral_mono_set (subset_toMeasurable (withDensity μ f) s) _ = μ.withDensity f t := (withDensity_apply f (measurableSet_toMeasurable (withDensity μ f) s)).symm _ = μ.withDensity f s := measure_toMeasurable s theorem withDensity_apply' [SFinite μ] (f : α → ℝ≥0∞) (s : Set α) : μ.withDensity f s = ∫⁻ a in s, f a ∂μ := by apply le_antisymm ?_ (withDensity_apply_le f s) let t := toMeasurable μ s calc μ.withDensity f s ≤ μ.withDensity f t := measure_mono (subset_toMeasurable μ s) _ = ∫⁻ a in t, f a ∂μ := withDensity_apply f (measurableSet_toMeasurable μ s) _ = ∫⁻ a in s, f a ∂μ := by congr 1; exact restrict_toMeasurable_of_sFinite s @[simp] lemma withDensity_zero_left (f : α → ℝ≥0∞) : (0 : Measure α).withDensity f = 0 := by ext s hs rw [withDensity_apply _ hs] simp theorem withDensity_congr_ae {f g : α → ℝ≥0∞} (h : f =ᵐ[μ] g) : μ.withDensity f = μ.withDensity g := by refine Measure.ext fun s hs => ?_ rw [withDensity_apply _ hs, withDensity_apply _ hs] exact lintegral_congr_ae (ae_restrict_of_ae h) #align measure_theory.with_density_congr_ae MeasureTheory.withDensity_congr_ae lemma withDensity_mono {f g : α → ℝ≥0∞} (hfg : f ≤ᵐ[μ] g) : μ.withDensity f ≤ μ.withDensity g := by refine le_iff.2 fun s hs ↦ ?_ rw [withDensity_apply _ hs, withDensity_apply _ hs] refine set_lintegral_mono_ae' hs ?_ filter_upwards [hfg] with x h_le using fun _ ↦ h_le theorem withDensity_add_left {f : α → ℝ≥0∞} (hf : Measurable f) (g : α → ℝ≥0∞) : μ.withDensity (f + g) = μ.withDensity f + μ.withDensity g := by refine Measure.ext fun s hs => ?_ rw [withDensity_apply _ hs, Measure.add_apply, withDensity_apply _ hs, withDensity_apply _ hs, ← lintegral_add_left hf] simp only [Pi.add_apply] #align measure_theory.with_density_add_left MeasureTheory.withDensity_add_left	Mathlib/MeasureTheory/Measure/WithDensity.lean	105	107	theorem withDensity_add_right (f : α → ℝ≥0∞) {g : α → ℝ≥0∞} (hg : Measurable g) : μ.withDensity (f + g) = μ.withDensity f + μ.withDensity g := by	simpa only [add_comm] using withDensity_add_left hg f
import Mathlib.Data.Nat.Factorial.Basic import Mathlib.Order.Monotone.Basic #align_import data.nat.choose.basic from "leanprover-community/mathlib"@"2f3994e1b117b1e1da49bcfb67334f33460c3ce4" open Nat namespace Nat def choose : ℕ → ℕ → ℕ \| _, 0 => 1 \| 0, _ + 1 => 0 \| n + 1, k + 1 => choose n k + choose n (k + 1) #align nat.choose Nat.choose @[simp] theorem choose_zero_right (n : ℕ) : choose n 0 = 1 := by cases n <;> rfl #align nat.choose_zero_right Nat.choose_zero_right @[simp] theorem choose_zero_succ (k : ℕ) : choose 0 (succ k) = 0 := rfl #align nat.choose_zero_succ Nat.choose_zero_succ theorem choose_succ_succ (n k : ℕ) : choose (succ n) (succ k) = choose n k + choose n (succ k) := rfl #align nat.choose_succ_succ Nat.choose_succ_succ theorem choose_succ_succ' (n k : ℕ) : choose (n + 1) (k + 1) = choose n k + choose n (k + 1) := rfl theorem choose_eq_zero_of_lt : ∀ {n k}, n < k → choose n k = 0 \| _, 0, hk => absurd hk (Nat.not_lt_zero _) \| 0, k + 1, _ => choose_zero_succ _ \| n + 1, k + 1, hk => by have hnk : n < k := lt_of_succ_lt_succ hk have hnk1 : n < k + 1 := lt_of_succ_lt hk rw [choose_succ_succ, choose_eq_zero_of_lt hnk, choose_eq_zero_of_lt hnk1] #align nat.choose_eq_zero_of_lt Nat.choose_eq_zero_of_lt @[simp] theorem choose_self (n : ℕ) : choose n n = 1 := by induction n <;> simp [, choose, choose_eq_zero_of_lt (lt_succ_self _)] #align nat.choose_self Nat.choose_self @[simp] theorem choose_succ_self (n : ℕ) : choose n (succ n) = 0 := choose_eq_zero_of_lt (lt_succ_self _) #align nat.choose_succ_self Nat.choose_succ_self @[simp] lemma choose_one_right (n : ℕ) : choose n 1 = n := by induction n <;> simp [, choose, Nat.add_comm] #align nat.choose_one_right Nat.choose_one_right -- The `n+1`-st triangle number is `n` more than the `n`-th triangle number theorem triangle_succ (n : ℕ) : (n + 1) * (n + 1 - 1) / 2 = n * (n - 1) / 2 + n := by rw [← add_mul_div_left, Nat.mul_comm 2 n, ← Nat.mul_add, Nat.add_sub_cancel, Nat.mul_comm] cases n <;> rfl; apply zero_lt_succ #align nat.triangle_succ Nat.triangle_succ theorem choose_two_right (n : ℕ) : choose n 2 = n * (n - 1) / 2 := by induction' n with n ih · simp · rw [triangle_succ n, choose, ih] simp [Nat.add_comm] #align nat.choose_two_right Nat.choose_two_right theorem choose_pos : ∀ {n k}, k ≤ n → 0 < choose n k \| 0, _, hk => by rw [Nat.eq_zero_of_le_zero hk]; decide \| n + 1, 0, _ => by simp \| n + 1, k + 1, hk => Nat.add_pos_left (choose_pos (le_of_succ_le_succ hk)) _ #align nat.choose_pos Nat.choose_pos theorem choose_eq_zero_iff {n k : ℕ} : n.choose k = 0 ↔ n < k := ⟨fun h => lt_of_not_ge (mt Nat.choose_pos h.symm.not_lt), Nat.choose_eq_zero_of_lt⟩ #align nat.choose_eq_zero_iff Nat.choose_eq_zero_iff theorem succ_mul_choose_eq : ∀ n k, succ n * choose n k = choose (succ n) (succ k) * succ k \| 0, 0 => by decide \| 0, k + 1 => by simp [choose] \| n + 1, 0 => by simp [choose, mul_succ, succ_eq_add_one, Nat.add_comm] \| n + 1, k + 1 => by rw [choose_succ_succ (succ n) (succ k), Nat.add_mul, ← succ_mul_choose_eq n, mul_succ, ← succ_mul_choose_eq n, Nat.add_right_comm, ← Nat.mul_add, ← choose_succ_succ, ← succ_mul] #align nat.succ_mul_choose_eq Nat.succ_mul_choose_eq theorem choose_mul_factorial_mul_factorial : ∀ {n k}, k ≤ n → choose n k * k ! * (n - k)! = n ! \| 0, _, hk => by simp [Nat.eq_zero_of_le_zero hk] \| n + 1, 0, _ => by simp \| n + 1, succ k, hk => by rcases lt_or_eq_of_le hk with hk₁ \| hk₁ · have h : choose n k * k.succ ! * (n - k)! = (k + 1) * n ! := by rw [← choose_mul_factorial_mul_factorial (le_of_succ_le_succ hk)] simp [factorial_succ, Nat.mul_comm, Nat.mul_left_comm, Nat.mul_assoc] have h₁ : (n - k)! = (n - k) * (n - k.succ)! := by rw [← succ_sub_succ, succ_sub (le_of_lt_succ hk₁), factorial_succ] have h₂ : choose n (succ k) * k.succ ! * ((n - k) * (n - k.succ)!) = (n - k) * n ! := by rw [← choose_mul_factorial_mul_factorial (le_of_lt_succ hk₁)] simp [factorial_succ, Nat.mul_comm, Nat.mul_left_comm, Nat.mul_assoc] have h₃ : k * n ! ≤ n * n ! := Nat.mul_le_mul_right _ (le_of_succ_le_succ hk) rw [choose_succ_succ, Nat.add_mul, Nat.add_mul, succ_sub_succ, h, h₁, h₂, Nat.add_mul, Nat.mul_sub_right_distrib, factorial_succ, ← Nat.add_sub_assoc h₃, Nat.add_assoc, ← Nat.add_mul, Nat.add_sub_cancel_left, Nat.add_comm] · rw [hk₁]; simp [hk₁, Nat.mul_comm, choose, Nat.sub_self] #align nat.choose_mul_factorial_mul_factorial Nat.choose_mul_factorial_mul_factorial theorem choose_mul {n k s : ℕ} (hkn : k ≤ n) (hsk : s ≤ k) : n.choose k * k.choose s = n.choose s * (n - s).choose (k - s) := have h : 0 < (n - k)! * (k - s)! * s ! := by apply_rules [factorial_pos, Nat.mul_pos] Nat.mul_right_cancel h <\| calc n.choose k * k.choose s * ((n - k)! * (k - s)! * s !) = n.choose k * (k.choose s * s ! * (k - s)!) * (n - k)! := by rw [Nat.mul_assoc, Nat.mul_assoc, Nat.mul_assoc, Nat.mul_assoc _ s !, Nat.mul_assoc, Nat.mul_comm (n - k)!, Nat.mul_comm s !] _ = n ! := by rw [choose_mul_factorial_mul_factorial hsk, choose_mul_factorial_mul_factorial hkn] _ = n.choose s * s ! * ((n - s).choose (k - s) * (k - s)! * (n - s - (k - s))!) := by rw [choose_mul_factorial_mul_factorial (Nat.sub_le_sub_right hkn _), choose_mul_factorial_mul_factorial (hsk.trans hkn)] _ = n.choose s * (n - s).choose (k - s) * ((n - k)! * (k - s)! * s !) := by rw [Nat.sub_sub_sub_cancel_right hsk, Nat.mul_assoc, Nat.mul_left_comm s !, Nat.mul_assoc, Nat.mul_comm (k - s)!, Nat.mul_comm s !, Nat.mul_right_comm, ← Nat.mul_assoc] #align nat.choose_mul Nat.choose_mul theorem choose_eq_factorial_div_factorial {n k : ℕ} (hk : k ≤ n) : choose n k = n ! / (k ! * (n - k)!) := by rw [← choose_mul_factorial_mul_factorial hk, Nat.mul_assoc] exact (mul_div_left _ (Nat.mul_pos (factorial_pos _) (factorial_pos _))).symm #align nat.choose_eq_factorial_div_factorial Nat.choose_eq_factorial_div_factorial theorem add_choose (i j : ℕ) : (i + j).choose j = (i + j)! / (i ! * j !) := by rw [choose_eq_factorial_div_factorial (Nat.le_add_left j i), Nat.add_sub_cancel_right, Nat.mul_comm] #align nat.add_choose Nat.add_choose	Mathlib/Data/Nat/Choose/Basic.lean	175	178	theorem add_choose_mul_factorial_mul_factorial (i j : ℕ) : (i + j).choose j * i ! * j ! = (i + j)! := by	rw [← choose_mul_factorial_mul_factorial (Nat.le_add_left _ _), Nat.add_sub_cancel_right, Nat.mul_right_comm]
import Mathlib.MeasureTheory.Constructions.Prod.Basic import Mathlib.MeasureTheory.Integral.DominatedConvergence import Mathlib.MeasureTheory.Integral.SetIntegral #align_import measure_theory.constructions.prod.integral from "leanprover-community/mathlib"@"fd5edc43dc4f10b85abfe544b88f82cf13c5f844" noncomputable section open scoped Classical Topology ENNReal MeasureTheory open Set Function Real ENNReal open MeasureTheory MeasurableSpace MeasureTheory.Measure open TopologicalSpace open Filter hiding prod_eq map variable {α α' β β' γ E : Type*} variable [MeasurableSpace α] [MeasurableSpace α'] [MeasurableSpace β] [MeasurableSpace β'] variable [MeasurableSpace γ] variable {μ μ' : Measure α} {ν ν' : Measure β} {τ : Measure γ} variable [NormedAddCommGroup E] theorem measurableSet_integrable [SigmaFinite ν] ⦃f : α → β → E⦄ (hf : StronglyMeasurable (uncurry f)) : MeasurableSet {x \| Integrable (f x) ν} := by simp_rw [Integrable, hf.of_uncurry_left.aestronglyMeasurable, true_and_iff] exact measurableSet_lt (Measurable.lintegral_prod_right hf.ennnorm) measurable_const #align measurable_set_integrable measurableSet_integrable section variable [NormedSpace ℝ E]	Mathlib/MeasureTheory/Constructions/Prod/Integral.lean	77	122	theorem MeasureTheory.StronglyMeasurable.integral_prod_right [SigmaFinite ν] ⦃f : α → β → E⦄ (hf : StronglyMeasurable (uncurry f)) : StronglyMeasurable fun x => ∫ y, f x y ∂ν := by	by_cases hE : CompleteSpace E; swap; · simp [integral, hE, stronglyMeasurable_const] borelize E haveI : SeparableSpace (range (uncurry f) ∪ {0} : Set E) := hf.separableSpace_range_union_singleton let s : ℕ → SimpleFunc (α × β) E := SimpleFunc.approxOn _ hf.measurable (range (uncurry f) ∪ {0}) 0 (by simp) let s' : ℕ → α → SimpleFunc β E := fun n x => (s n).comp (Prod.mk x) measurable_prod_mk_left let f' : ℕ → α → E := fun n => {x \| Integrable (f x) ν}.indicator fun x => (s' n x).integral ν have hf' : ∀ n, StronglyMeasurable (f' n) := by intro n; refine StronglyMeasurable.indicator ?_ (measurableSet_integrable hf) have : ∀ x, ((s' n x).range.filter fun x => x ≠ 0) ⊆ (s n).range := by intro x; refine Finset.Subset.trans (Finset.filter_subset _ _) ?_; intro y simp_rw [SimpleFunc.mem_range]; rintro ⟨z, rfl⟩; exact ⟨(x, z), rfl⟩ simp only [SimpleFunc.integral_eq_sum_of_subset (this _)] refine Finset.stronglyMeasurable_sum _ fun x _ => ?_ refine (Measurable.ennreal_toReal ?_).stronglyMeasurable.smul_const _ simp only [s', SimpleFunc.coe_comp, preimage_comp] apply measurable_measure_prod_mk_left exact (s n).measurableSet_fiber x have h2f' : Tendsto f' atTop (𝓝 fun x : α => ∫ y : β, f x y ∂ν) := by rw [tendsto_pi_nhds]; intro x by_cases hfx : Integrable (f x) ν · have (n) : Integrable (s' n x) ν := by apply (hfx.norm.add hfx.norm).mono' (s' n x).aestronglyMeasurable filter_upwards with y simp_rw [s', SimpleFunc.coe_comp]; exact SimpleFunc.norm_approxOn_zero_le _ _ (x, y) n simp only [f', hfx, SimpleFunc.integral_eq_integral _ (this _), indicator_of_mem, mem_setOf_eq] refine tendsto_integral_of_dominated_convergence (fun y => ‖f x y‖ + ‖f x y‖) (fun n => (s' n x).aestronglyMeasurable) (hfx.norm.add hfx.norm) ?_ ?_ · refine fun n => eventually_of_forall fun y => SimpleFunc.norm_approxOn_zero_le ?_ ?_ (x, y) n -- Porting note: Lean 3 solved the following two subgoals on its own · exact hf.measurable · simp · refine eventually_of_forall fun y => SimpleFunc.tendsto_approxOn ?_ ?_ ?_ -- Porting note: Lean 3 solved the following two subgoals on its own · exact hf.measurable.of_uncurry_left · simp apply subset_closure simp [-uncurry_apply_pair] · simp [f', hfx, integral_undef] exact stronglyMeasurable_of_tendsto _ hf' h2f'

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