Split (1)

train · 219k rows

url stringclasses 147 values	commit stringclasses 147 values	file_path stringlengths 7 101	full_name stringlengths 1 94	start stringlengths 6 10	end stringlengths 6 11	tactic stringlengths 1 11.2k	state_before stringlengths 3 2.09M	state_after stringlengths 6 2.09M	input stringlengths 73 2.09M
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	intro e ep	case intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n)...	case intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n)...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	generalize d4 : (1 - a) * (e / 4) = d	case intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n)...	case intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n)...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	have dp : d > 0 := by rw [← d4]; bound	case intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n)...	case intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n)...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rcases Filter.eventually_atTop.mp (Metric.tendstoUniformlyOn_iff.mp u d dp) with ⟨n, hn'⟩	case intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n)...	case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) ...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	set hn := hn' n	case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) ...	case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) ...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSe...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	simp at hn	case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) ...	case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) ...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSe...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	clear hn' u	case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) ...	case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), Continu...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSe...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	have dfg : dist (f n (c + y)) (g (c + y)) ≤ d := by apply le_of_lt; rw [dist_comm] refine hn (c + y) ?_ apply cb simp; exact yr.le	case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), Continu...	case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), Continu...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), Ha...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	set hs := (hpf n).hasSum yb	case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), Continu...	case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), Continu...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), Ha...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rw [HasSum, Metric.tendsto_atTop] at hs	case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), Continu...	case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), Continu...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), Ha...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rcases hs d dp with ⟨N, NM⟩	case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), Continu...	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), Ha...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	clear hs	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	exists N	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	intro M NlM	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	have dpf := (NM M NlM).le	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	clear NM NlM N yb	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	generalize hMp : M.sum (fun k : ℕ ↦ p k fun _ ↦ y) = Mp	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rw [hMp] at dppr	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	generalize hMpr : M.sum (fun k ↦ pr n k fun _ ↦ y) = Mpr	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rw [hMpr] at dpf dppr	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	calc dist Mp (g (c + y)) _ ≤ dist Mp (f n (c + y)) + dist (f n (c + y)) (g (c + y)) := dist_triangle _ _ _ _ ≤ dist Mp Mpr + dist Mpr (f n (c + y)) + d := by bound _ ≤ e / 4 + d + d := by bound _ = e / 4 + 2 * (1 - a) * (e / 4) := by rw [← d4]; ring _ ≤ e / 4 + 2 * (1 - 0) * (e / 4) := by bound _ = 3 / 4 * ...	case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	no goals	Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro.intro.intro I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	intro n	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ o : IsOpen s h : ∀ (n : I), AnalyticOn ℂ (f n) s u : TendstoUniformlyOn f g atTop s c : ℂ hc : c ∈ s r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r hb : ∀ (n : I), AnalyticOn ℂ (f n) (closedBall c ↑r) pr : I → FormalMultilinearSeries ℂ ℂ ℂ :=...	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ o : IsOpen s h : ∀ (n : I), AnalyticOn ℂ (f n) s u : TendstoUniformlyOn f g atTop s c : ℂ hc : c ∈ s r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r hb : ∀ (n : I), AnalyticOn ℂ (f n) (closedBall c ↑r) pr : I → FormalMultilinearSeries ℂ ℂ ℂ :=...	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ o : IsOpen s h : ∀ (n : I), AnalyticOn ℂ (f n) s u : TendstoUniformlyOn f g atTop s c : ℂ hc : c ∈ s r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r hb : ∀ (n : I), AnalyticOn ℂ (f n...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	have cs := cauchy_on_cball_radius rp (hb n)	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ o : IsOpen s h : ∀ (n : I), AnalyticOn ℂ (f n) s u : TendstoUniformlyOn f g atTop s c : ℂ hc : c ∈ s r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r hb : ∀ (n : I), AnalyticOn ℂ (f n) (closedBall c ↑r) pr : I → FormalMultilinearSeries ℂ ℂ ℂ :=...	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ o : IsOpen s h : ∀ (n : I), AnalyticOn ℂ (f n) s u : TendstoUniformlyOn f g atTop s c : ℂ hc : c ∈ s r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r hb : ∀ (n : I), AnalyticOn ℂ (f n) (closedBall c ↑r) pr : I → FormalMultilinearSeries ℂ ℂ ℂ :=...	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ o : IsOpen s h : ∀ (n : I), AnalyticOn ℂ (f n) s u : TendstoUniformlyOn f g atTop s c : ℂ hc : c ∈ s r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r hb : ∀ (n : I), AnalyticOn ℂ (f n...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	have pn : pr n = cauchyPowerSeries (f n) c r := rfl	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ o : IsOpen s h : ∀ (n : I), AnalyticOn ℂ (f n) s u : TendstoUniformlyOn f g atTop s c : ℂ hc : c ∈ s r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r hb : ∀ (n : I), AnalyticOn ℂ (f n) (closedBall c ↑r) pr : I → FormalMultilinearSeries ℂ ℂ ℂ :=...	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ o : IsOpen s h : ∀ (n : I), AnalyticOn ℂ (f n) s u : TendstoUniformlyOn f g atTop s c : ℂ hc : c ∈ s r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r hb : ∀ (n : I), AnalyticOn ℂ (f n) (closedBall c ↑r) pr : I → FormalMultilinearSeries ℂ ℂ ℂ :=...	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ o : IsOpen s h : ∀ (n : I), AnalyticOn ℂ (f n) s u : TendstoUniformlyOn f g atTop s c : ℂ hc : c ∈ s r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r hb : ∀ (n : I), AnalyticOn ℂ (f n...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rw [← pn] at cs	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ o : IsOpen s h : ∀ (n : I), AnalyticOn ℂ (f n) s u : TendstoUniformlyOn f g atTop s c : ℂ hc : c ∈ s r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r hb : ∀ (n : I), AnalyticOn ℂ (f n) (closedBall c ↑r) pr : I → FormalMultilinearSeries ℂ ℂ ℂ :=...	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ o : IsOpen s h : ∀ (n : I), AnalyticOn ℂ (f n) s u : TendstoUniformlyOn f g atTop s c : ℂ hc : c ∈ s r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r hb : ∀ (n : I), AnalyticOn ℂ (f n) (closedBall c ↑r) pr : I → FormalMultilinearSeries ℂ ℂ ℂ :=...	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ o : IsOpen s h : ∀ (n : I), AnalyticOn ℂ (f n) s u : TendstoUniformlyOn f g atTop s c : ℂ hc : c ∈ s r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r hb : ∀ (n : I), AnalyticOn ℂ (f n...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	exact cs	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ o : IsOpen s h : ∀ (n : I), AnalyticOn ℂ (f n) s u : TendstoUniformlyOn f g atTop s c : ℂ hc : c ∈ s r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r hb : ∀ (n : I), AnalyticOn ℂ (f n) (closedBall c ↑r) pr : I → FormalMultilinearSeries ℂ ℂ ℂ :=...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ o : IsOpen s h : ∀ (n : I), AnalyticOn ℂ (f n) s u : TendstoUniformlyOn f g atTop s c : ℂ hc : c ∈ s r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r hb : ∀ (n : I), AnalyticOn ℂ (f n...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	bound	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	bound	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rw [← d4]	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	bound	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), C...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ u : TendstoUniformlyOn f g atTop s c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	apply le_of_lt	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	case a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rw [dist_comm]	case a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	case a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	Please generate a tactic in lean4 to solve the state. STATE: case a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	refine hn (c + y) ?_	case a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	case a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	Please generate a tactic in lean4 to solve the state. STATE: case a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	apply cb	case a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	case a.a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedB...	Please generate a tactic in lean4 to solve the state. STATE: case a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	simp	case a.a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedB...	case a.a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedB...	Please generate a tactic in lean4 to solve the state. STATE: case a.a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	exact yr.le	case a.a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedB...	no goals	Please generate a tactic in lean4 to solve the state. STATE: case a.a I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	trans M.sum fun k : ℕ ↦ dist (p k fun _ ↦ y) (pr n k fun _ ↦ y)	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	apply dist_sum_sum_le M (fun k : ℕ ↦ p k fun _ ↦ y) fun k : ℕ ↦ pr n k fun _ ↦ y	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	trans M.sum fun k ↦ a ^ k * d	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	apply Finset.sum_le_sum	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	intro k _	case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	Please generate a tactic in lean4 to solve the state. STATE: case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	have hak : a ^ k = abs y ^ k * r⁻¹ ^ k := by calc (abs y / r) ^ k _ = (abs y * r⁻¹) ^ k := by rw [div_eq_mul_inv, NNReal.coe_inv] _ = abs y ^ k * r⁻¹ ^ k := mul_pow _ _ _	case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	Please generate a tactic in lean4 to solve the state. STATE: case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rw [hak]	case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	Please generate a tactic in lean4 to solve the state. STATE: case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	generalize hd' : d.toNNReal = d'	case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	Please generate a tactic in lean4 to solve the state. STATE: case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	have dd : (d' : ℝ) = d := by rw [← hd']; exact Real.coe_toNNReal d dp.le	case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	Please generate a tactic in lean4 to solve the state. STATE: case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	have hcb : ∀ z, z ∈ closedBall c r → abs (g z - f n z) ≤ d' := by intro z zb; exact _root_.trans (hn z (cb zb)).le (le_of_eq dd.symm)	case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	Please generate a tactic in lean4 to solve the state. STATE: case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	exact _root_.trans (cauchy_dist k y rp cg (cf n) hcb) (mul_le_mul_of_nonneg_left (le_of_eq dd) (by bound))	case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBal...	no goals	Please generate a tactic in lean4 to solve the state. STATE: case h I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	calc (abs y / r) ^ k _ = (abs y * r⁻¹) ^ k := by rw [div_eq_mul_inv, NNReal.coe_inv] _ = abs y ^ k * r⁻¹ ^ k := mul_pow _ _ _	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rw [div_eq_mul_inv, NNReal.coe_inv]	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rw [← hd']	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	exact Real.coe_toNNReal d dp.le	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	intro z zb	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	exact _root_.trans (hn z (cb zb)).le (le_of_eq dd.symm)	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	bound	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	have pgb : (M.sum fun k ↦ a ^ k) ≤ (1 - a)⁻¹ := partial_geometric_bound M a0 a1	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	calc (M.sum fun k ↦ a ^ k * d) = (M.sum fun k ↦ a ^ k) * d := by rw [← Finset.sum_mul] _ ≤ (1 - a)⁻¹ * d := by bound _ = (1 - a)⁻¹ * ((1 - a) * (e / 4)) := by rw [← d4] _ = (1 - a) * (1 - a)⁻¹ * (e / 4) := by ring _ = 1 * (e / 4) := by rw [mul_inv_cancel a1p.ne'] _ = e / 4 := by ring	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rw [← Finset.sum_mul]	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	bound	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rw [← d4]	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	ring	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rw [mul_inv_cancel a1p.ne']	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	ring	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	bound	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	bound	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	rw [← d4]	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	ring	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	bound	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	ring	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	norm_num	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Analytic/Uniform.lean	uniform_analytic_lim	[189, 1]	[270, 21]	simp	I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr n) c ↑r cf : ∀ (n : I), ContinuousOn (f n) (closedBall c ↑r)...	no goals	Please generate a tactic in lean4 to solve the state. STATE: I : Type inst✝¹ : Lattice I inst✝ : Nonempty I f : I → ℂ → ℂ g : ℂ → ℂ s : Set ℂ c : ℂ r : ℝ≥0 cb : closedBall c ↑r ⊆ s rp : 0 < r pr : I → FormalMultilinearSeries ℂ ℂ ℂ := fun n => cauchyPowerSeries (f n) c ↑r hpf : ∀ (n : I), HasFPowerSeriesOnBall (f n) (pr...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	generalize hc : (fun n ↦ Classical.choose ((sc.bddAbove_image (fc n).norm).exists_ge 0)) = c	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : UniformCauchySeqOn f atTop s fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s ⊢ ∃ b, 0 ≤ b ∧ ∀ (n : ℕ), ∀ x ∈ s, ‖f n x‖ ≤ b	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : UniformCauchySeqOn f atTop s fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c ⊢ ∃ b, 0 ≤ b ∧ ∀ (n : ℕ), ∀ x ∈ s, ‖f n x‖ ≤ b	Please generate a tactic in lean4 to solve the state. STATE: X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : UniformCauchySeqOn f atTop s fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s ⊢ ∃ b, 0 ≤ b ∧ ∀ (n : ℕ), ∀ x ∈ s, ‖f n x‖ ≤ b TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	have cs : ∀ n, 0 ≤ c n ∧ ∀ x, x ∈ s → ‖f n x‖ ≤ c n := fun n ↦ by simpa only [← hc, mem_image, forall_exists_index, and_imp, forall_apply_eq_imp_iff₂] using Classical.choose_spec ((sc.bddAbove_image (fc n).norm).exists_ge 0)	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : UniformCauchySeqOn f atTop s fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c ⊢ ∃ b, 0 ≤ b ∧ ∀ (n : ℕ), ∀ x ∈ s, ‖f n x‖ ≤ b	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : UniformCauchySeqOn f atTop s fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n ⊢ ∃ b, 0 ≤ b ∧ ∀ (n : ℕ), ∀ x ∈ s, ‖f n x‖ ...	Please generate a tactic in lean4 to solve the state. STATE: X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : UniformCauchySeqOn f atTop s fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c ⊢ ∃ b, 0 ≤ b ∧ ∀ (n : ℕ), ∀ x ∈...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	rw [Metric.uniformCauchySeqOn_iff] at u	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : UniformCauchySeqOn f atTop s fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n ⊢ ∃ b, 0 ≤ b ∧ ∀ (n : ℕ), ∀ x ∈ s, ‖f n x‖ ...	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : ∀ ε > 0, ∃ N, ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < ε fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n ⊢ ∃ b,...	Please generate a tactic in lean4 to solve the state. STATE: X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : UniformCauchySeqOn f atTop s fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	rcases u 1 (by norm_num) with ⟨N, H⟩	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : ∀ ε > 0, ∃ N, ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < ε fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n ⊢ ∃ b,...	case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : ∀ ε > 0, ∃ N, ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < ε fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤...	Please generate a tactic in lean4 to solve the state. STATE: X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : ∀ ε > 0, ∃ N, ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < ε fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	clear u	case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : ∀ ε > 0, ∃ N, ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < ε fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤...	case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 ⊢ ∃...	Please generate a tactic in lean4 to solve the state. STATE: case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : ∀ ε > 0, ∃ N, ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < ε fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classic...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	generalize hbs : Finset.image c (Finset.range (N + 1)) = bs	case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 ⊢ ∃...	case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs ...	Please generate a tactic in lean4 to solve the state. STATE: case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	have c0 : c 0 ∈ bs := by simp [← hbs]; exists 0; simp	case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs ...	case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs ...	Please generate a tactic in lean4 to solve the state. STATE: case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	generalize hb : 1 + bs.max' ⟨_, c0⟩ = b	case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs ...	case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs ...	Please generate a tactic in lean4 to solve the state. STATE: case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	exists b	case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs ...	case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs ...	Please generate a tactic in lean4 to solve the state. STATE: case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	constructor	case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs ...	case intro.left X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < ...	Please generate a tactic in lean4 to solve the state. STATE: case intro X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	simpa only [← hc, mem_image, forall_exists_index, and_imp, forall_apply_eq_imp_iff₂] using Classical.choose_spec ((sc.bddAbove_image (fc n).norm).exists_ge 0)	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : UniformCauchySeqOn f atTop s fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c n : ℕ ⊢ 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n	no goals	Please generate a tactic in lean4 to solve the state. STATE: X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : UniformCauchySeqOn f atTop s fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c n : ℕ ⊢ 0 ≤ c n ∧ ∀ x ∈ s, ‖f n...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	norm_num	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : ∀ ε > 0, ∃ N, ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < ε fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n ⊢ 1 > ...	no goals	Please generate a tactic in lean4 to solve the state. STATE: X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X u : ∀ ε > 0, ∃ N, ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < ε fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	simp [← hbs]	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : Finset ℝ ...	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : Finset ℝ ...	Please generate a tactic in lean4 to solve the state. STATE: X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	exists 0	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : Finset ℝ ...	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : Finset ℝ ...	Please generate a tactic in lean4 to solve the state. STATE: X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	simp	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : Finset ℝ ...	no goals	Please generate a tactic in lean4 to solve the state. STATE: X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	rw [← hb]	case intro.left X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < ...	case intro.left X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < ...	Please generate a tactic in lean4 to solve the state. STATE: case intro.left X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	exact add_nonneg (by norm_num) (_root_.trans (cs 0).1 (Finset.le_max' _ _ c0))	case intro.left X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < ...	no goals	Please generate a tactic in lean4 to solve the state. STATE: case intro.left X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	norm_num	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : Finset ℝ ...	no goals	Please generate a tactic in lean4 to solve the state. STATE: X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	intro n x xs	case intro.right X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) <...	case intro.right X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) <...	Please generate a tactic in lean4 to solve the state. STATE: case intro.right X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	by_cases nN : n ≤ N	case intro.right X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) <...	case pos X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : ...	Please generate a tactic in lean4 to solve the state. STATE: case intro.right X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	have cn : c n ∈ bs := by simp [← hbs]; exists n; simp [Nat.lt_add_one_iff.mpr nN]	case pos X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : ...	case pos X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : ...	Please generate a tactic in lean4 to solve the state. STATE: case pos X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	exact _root_.trans ((cs n).2 x xs) (_root_.trans (Finset.le_max' _ _ cn) (by simp only [le_add_iff_nonneg_left, zero_le_one, ← hb]))	case pos X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : ...	no goals	Please generate a tactic in lean4 to solve the state. STATE: case pos X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	simp [← hbs]	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : Finset ℝ ...	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : Finset ℝ ...	Please generate a tactic in lean4 to solve the state. STATE: X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	exists n	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : Finset ℝ ...	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : Finset ℝ ...	Please generate a tactic in lean4 to solve the state. STATE: X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	simp [Nat.lt_add_one_iff.mpr nN]	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : Finset ℝ ...	no goals	Please generate a tactic in lean4 to solve the state. STATE: X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	simp only [le_add_iff_nonneg_left, zero_le_one, ← hb]	X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : Finset ℝ ...	no goals	Please generate a tactic in lean4 to solve the state. STATE: X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	simp at nN	case neg X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : ...	case neg X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : ...	Please generate a tactic in lean4 to solve the state. STATE: case neg X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	specialize H N le_rfl n nN.le x xs	case neg X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ H : ∀ m ≥ N, ∀ n ≥ N, ∀ x ∈ s, dist (f m x) (f n x) < 1 bs : ...	case neg X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ bs : Finset ℝ hbs : Finset.image c (Finset.range (N + 1)) = b...	Please generate a tactic in lean4 to solve the state. STATE: case neg X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	have cN : c N ∈ bs := by simp [← hbs]; exists N; simp	case neg X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ bs : Finset ℝ hbs : Finset.image c (Finset.range (N + 1)) = b...	case neg X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ bs : Finset ℝ hbs : Finset.image c (Finset.range (N + 1)) = b...	Please generate a tactic in lean4 to solve the state. STATE: case neg X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ ...
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Misc/Topology.lean	UniformCauchySeqOn.bounded	[21, 1]	[49, 35]	have bN := _root_.trans ((cs N).2 x xs) (Finset.le_max' _ _ cN)	case neg X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ bs : Finset ℝ hbs : Finset.image c (Finset.range (N + 1)) = b...	case neg X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ bs : Finset ℝ hbs : Finset.image c (Finset.range (N + 1)) = b...	Please generate a tactic in lean4 to solve the state. STATE: case neg X Y : Type inst✝¹ : TopologicalSpace X inst✝ : NormedAddCommGroup Y f : ℕ → X → Y s : Set X fc : ∀ (n : ℕ), ContinuousOn (f n) s sc : IsCompact s c : ℕ → ℝ hc : (fun n => Classical.choose ⋯) = c cs : ∀ (n : ℕ), 0 ≤ c n ∧ ∀ x ∈ s, ‖f n x‖ ≤ c n N : ℕ ...

Subsets and Splits

No community queries yet

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