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/Dynamics/Grow.lean	eqns_unique	[396, 1]	[411, 68]	exact tendsto_nhds_unique_of_frequently_eq (e1 _ mt).holo.continuousAt (e2 _ mt).holo.continuousAt mu	S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 r2 : ℂ → ℂ → S t : Set (ℂ × ℂ) pre : IsPreconnected t e1 : ∀ x ∈ t, Eqns s n r0 r1 x e2 : ∀ x ∈ t, Eqns s n r0 r2 x u : Set (ℂ × ℂ) := {x \| uncurry r1 x = uncurry r2 x} ne : (t ∩ u).Nonempty op : t ∩ u ⊆ interior u x : ℂ × ℂ mt : x ∈ t mu : ∃ᶠ (x : ℂ × ℂ) in 𝓝 x, x ∈ u ⊢ x ∈ u	no goals	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 r2 : ℂ → ℂ → S t : Set (ℂ × ℂ) pre : IsPreconnected t e1 : ∀ x ∈ t, Eqns s n r0 r1 x e2 : ∀ x ∈ t, Eqns s n r0 r2 x u : Set (ℂ × ℂ) := {x \| uncurry r1 x = uncurry r2 x} ne : (t ∩ u).Nonempty op : t ∩ u ⊆ interior u x : ℂ × ℂ mt : x ∈ t mu : ∃ᶠ (x : ℂ × ℂ) in 𝓝 x, x ∈ u ⊢ x ∈ u TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	Grow.unique	[414, 1]	[433, 59]	by_cases pos : p0 < 0	S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 ⊢ (𝓝ˢ ({c} ×ˢ closedBall 0 p0)).EventuallyEq (uncurry r0) (uncurry r1)	case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : p0 < 0 ⊢ (𝓝ˢ ({c} ×ˢ closedBall 0 p0)).EventuallyEq (uncurry r0) (uncurry r1) case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 ⊢ (𝓝ˢ ({c} ×ˢ closedBall 0 p0)).EventuallyEq (uncurry r0) (uncurry r1)	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 ⊢ (𝓝ˢ ({c} ×ˢ closedBall 0 p0)).EventuallyEq (uncurry r0) (uncurry r1) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	Grow.unique	[414, 1]	[433, 59]	have m : (c, (0 : ℂ)) ∈ {c} ×ˢ closedBall (0 : ℂ) p0 := mem_domain c (not_lt.mp pos)	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 ⊢ (𝓝ˢ ({c} ×ˢ closedBall 0 p0)).EventuallyEq (uncurry r0) (uncurry r1)	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 ⊢ (𝓝ˢ ({c} ×ˢ closedBall 0 p0)).EventuallyEq (uncurry r0) (uncurry r1)	Please generate a tactic in lean4 to solve the state. STATE: case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 ⊢ (𝓝ˢ ({c} ×ˢ closedBall 0 p0)).EventuallyEq (uncurry r0) (uncurry r1) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	Grow.unique	[414, 1]	[433, 59]	refine HolomorphicOn.eq_of_locally_eq g0.holo (g1.holo.mono (domain_mono _ p01)) (domain_preconnected _ _) ⟨(c, 0), m, ?_⟩	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 ⊢ (𝓝ˢ ({c} ×ˢ closedBall 0 p0)).EventuallyEq (uncurry r0) (uncurry r1)	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 ⊢ (𝓝 (c, 0)).EventuallyEq (uncurry r0) (uncurry r1)	Please generate a tactic in lean4 to solve the state. STATE: case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 ⊢ (𝓝ˢ ({c} ×ˢ closedBall 0 p0)).EventuallyEq (uncurry r0) (uncurry r1) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	Grow.unique	[414, 1]	[433, 59]	have t : ContinuousAt (fun x : ℂ × ℂ ↦ (x.1, r0 x.1 x.2, r1 x.1 x.2)) (c, 0) := continuousAt_fst.prod ((g0.eqn.filter_mono (nhds_le_nhdsSet m)).self_of_nhds.holo.continuousAt.prod (g1.eqn.filter_mono (nhds_le_nhdsSet (domain_mono c p01 m))).self_of_nhds.holo.continuousAt)	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 ⊢ (𝓝 (c, 0)).EventuallyEq (uncurry r0) (uncurry r1)	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : ContinuousAt (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (c, 0) ⊢ (𝓝 (c, 0)).EventuallyEq (uncurry r0) (uncurry r1)	Please generate a tactic in lean4 to solve the state. STATE: case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 ⊢ (𝓝 (c, 0)).EventuallyEq (uncurry r0) (uncurry r1) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	Grow.unique	[414, 1]	[433, 59]	simp only [ContinuousAt, g0.zero, g1.zero] at t	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : ContinuousAt (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (c, 0) ⊢ (𝓝 (c, 0)).EventuallyEq (uncurry r0) (uncurry r1)	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : Tendsto (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (𝓝 (c, 0)) (𝓝 (c, a, a)) ⊢ (𝓝 (c, 0)).EventuallyEq (uncurry r0) (uncurry r1)	Please generate a tactic in lean4 to solve the state. STATE: case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : ContinuousAt (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (c, 0) ⊢ (𝓝 (c, 0)).EventuallyEq (uncurry r0) (uncurry r1) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	Grow.unique	[414, 1]	[433, 59]	have inj := (s.bottcherNear_holomorphic _ (s.mem_near c)).local_inj' (s.bottcherNear_mfderiv_ne_zero c)	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : Tendsto (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (𝓝 (c, 0)) (𝓝 (c, a, a)) ⊢ (𝓝 (c, 0)).EventuallyEq (uncurry r0) (uncurry r1)	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : Tendsto (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (𝓝 (c, 0)) (𝓝 (c, a, a)) inj : ∀ᶠ (p : ℂ × S × S) in 𝓝 (c, a, a), s.bottcherNear p.1 p.2.1 = s.bottcherNear p.1 p.2.2 → p.2.1 = p.2.2 ⊢ (𝓝 (c, 0)).EventuallyEq (uncurry r0) (uncurry r1)	Please generate a tactic in lean4 to solve the state. STATE: case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : Tendsto (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (𝓝 (c, 0)) (𝓝 (c, a, a)) ⊢ (𝓝 (c, 0)).EventuallyEq (uncurry r0) (uncurry r1) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	Grow.unique	[414, 1]	[433, 59]	refine ((t.eventually inj).and (g0.start.and g1.start)).mp (eventually_of_forall ?_)	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : Tendsto (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (𝓝 (c, 0)) (𝓝 (c, a, a)) inj : ∀ᶠ (p : ℂ × S × S) in 𝓝 (c, a, a), s.bottcherNear p.1 p.2.1 = s.bottcherNear p.1 p.2.2 → p.2.1 = p.2.2 ⊢ (𝓝 (c, 0)).EventuallyEq (uncurry r0) (uncurry r1)	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : Tendsto (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (𝓝 (c, 0)) (𝓝 (c, a, a)) inj : ∀ᶠ (p : ℂ × S × S) in 𝓝 (c, a, a), s.bottcherNear p.1 p.2.1 = s.bottcherNear p.1 p.2.2 → p.2.1 = p.2.2 ⊢ ∀ (x : ℂ × ℂ), (s.bottcherNear (x.1, r0 x.1 x.2, r1 x.1 x.2).1 (x.1, r0 x.1 x.2, r1 x.1 x.2).2.1 = s.bottcherNear (x.1, r0 x.1 x.2, r1 x.1 x.2).1 (x.1, r0 x.1 x.2, r1 x.1 x.2).2.2 → (x.1, r0 x.1 x.2, r1 x.1 x.2).2.1 = (x.1, r0 x.1 x.2, r1 x.1 x.2).2.2) ∧ s.bottcherNear x.1 (r0 x.1 x.2) = x.2 ∧ s.bottcherNear x.1 (r1 x.1 x.2) = x.2 → uncurry r0 x = uncurry r1 x	Please generate a tactic in lean4 to solve the state. STATE: case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : Tendsto (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (𝓝 (c, 0)) (𝓝 (c, a, a)) inj : ∀ᶠ (p : ℂ × S × S) in 𝓝 (c, a, a), s.bottcherNear p.1 p.2.1 = s.bottcherNear p.1 p.2.2 → p.2.1 = p.2.2 ⊢ (𝓝 (c, 0)).EventuallyEq (uncurry r0) (uncurry r1) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	Grow.unique	[414, 1]	[433, 59]	intro ⟨e, y⟩ ⟨inj, s0, s1⟩	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : Tendsto (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (𝓝 (c, 0)) (𝓝 (c, a, a)) inj : ∀ᶠ (p : ℂ × S × S) in 𝓝 (c, a, a), s.bottcherNear p.1 p.2.1 = s.bottcherNear p.1 p.2.2 → p.2.1 = p.2.2 ⊢ ∀ (x : ℂ × ℂ), (s.bottcherNear (x.1, r0 x.1 x.2, r1 x.1 x.2).1 (x.1, r0 x.1 x.2, r1 x.1 x.2).2.1 = s.bottcherNear (x.1, r0 x.1 x.2, r1 x.1 x.2).1 (x.1, r0 x.1 x.2, r1 x.1 x.2).2.2 → (x.1, r0 x.1 x.2, r1 x.1 x.2).2.1 = (x.1, r0 x.1 x.2, r1 x.1 x.2).2.2) ∧ s.bottcherNear x.1 (r0 x.1 x.2) = x.2 ∧ s.bottcherNear x.1 (r1 x.1 x.2) = x.2 → uncurry r0 x = uncurry r1 x	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : Tendsto (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (𝓝 (c, 0)) (𝓝 (c, a, a)) inj✝ : ∀ᶠ (p : ℂ × S × S) in 𝓝 (c, a, a), s.bottcherNear p.1 p.2.1 = s.bottcherNear p.1 p.2.2 → p.2.1 = p.2.2 e y : ℂ inj : s.bottcherNear ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).1 ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).2.1 = s.bottcherNear ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).1 ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).2.2 → ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).2.1 = ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).2.2 s0 : s.bottcherNear (e, y).1 (r0 (e, y).1 (e, y).2) = (e, y).2 s1 : s.bottcherNear (e, y).1 (r1 (e, y).1 (e, y).2) = (e, y).2 ⊢ uncurry r0 (e, y) = uncurry r1 (e, y)	Please generate a tactic in lean4 to solve the state. STATE: case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : Tendsto (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (𝓝 (c, 0)) (𝓝 (c, a, a)) inj : ∀ᶠ (p : ℂ × S × S) in 𝓝 (c, a, a), s.bottcherNear p.1 p.2.1 = s.bottcherNear p.1 p.2.2 → p.2.1 = p.2.2 ⊢ ∀ (x : ℂ × ℂ), (s.bottcherNear (x.1, r0 x.1 x.2, r1 x.1 x.2).1 (x.1, r0 x.1 x.2, r1 x.1 x.2).2.1 = s.bottcherNear (x.1, r0 x.1 x.2, r1 x.1 x.2).1 (x.1, r0 x.1 x.2, r1 x.1 x.2).2.2 → (x.1, r0 x.1 x.2, r1 x.1 x.2).2.1 = (x.1, r0 x.1 x.2, r1 x.1 x.2).2.2) ∧ s.bottcherNear x.1 (r0 x.1 x.2) = x.2 ∧ s.bottcherNear x.1 (r1 x.1 x.2) = x.2 → uncurry r0 x = uncurry r1 x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	Grow.unique	[414, 1]	[433, 59]	exact inj (s0.trans s1.symm)	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : Tendsto (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (𝓝 (c, 0)) (𝓝 (c, a, a)) inj✝ : ∀ᶠ (p : ℂ × S × S) in 𝓝 (c, a, a), s.bottcherNear p.1 p.2.1 = s.bottcherNear p.1 p.2.2 → p.2.1 = p.2.2 e y : ℂ inj : s.bottcherNear ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).1 ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).2.1 = s.bottcherNear ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).1 ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).2.2 → ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).2.1 = ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).2.2 s0 : s.bottcherNear (e, y).1 (r0 (e, y).1 (e, y).2) = (e, y).2 s1 : s.bottcherNear (e, y).1 (r1 (e, y).1 (e, y).2) = (e, y).2 ⊢ uncurry r0 (e, y) = uncurry r1 (e, y)	no goals	Please generate a tactic in lean4 to solve the state. STATE: case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : ¬p0 < 0 m : (c, 0) ∈ {c} ×ˢ closedBall 0 p0 t : Tendsto (fun x => (x.1, r0 x.1 x.2, r1 x.1 x.2)) (𝓝 (c, 0)) (𝓝 (c, a, a)) inj✝ : ∀ᶠ (p : ℂ × S × S) in 𝓝 (c, a, a), s.bottcherNear p.1 p.2.1 = s.bottcherNear p.1 p.2.2 → p.2.1 = p.2.2 e y : ℂ inj : s.bottcherNear ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).1 ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).2.1 = s.bottcherNear ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).1 ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).2.2 → ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).2.1 = ((e, y).1, r0 (e, y).1 (e, y).2, r1 (e, y).1 (e, y).2).2.2 s0 : s.bottcherNear (e, y).1 (r0 (e, y).1 (e, y).2) = (e, y).2 s1 : s.bottcherNear (e, y).1 (r1 (e, y).1 (e, y).2) = (e, y).2 ⊢ uncurry r0 (e, y) = uncurry r1 (e, y) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	Grow.unique	[414, 1]	[433, 59]	simp only [Metric.closedBall_eq_empty.mpr pos, singleton_prod, image_empty, nhdsSet_empty, Filter.EventuallyEq, Filter.eventually_bot]	case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : p0 < 0 ⊢ (𝓝ˢ ({c} ×ˢ closedBall 0 p0)).EventuallyEq (uncurry r0) (uncurry r1)	no goals	Please generate a tactic in lean4 to solve the state. STATE: case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r r0 r1 : ℂ → ℂ → S p0 p1 : ℝ n0 n1 : ℕ g0 : Grow s c p0 n0 r0 g1 : Grow s c p1 n1 r1 p01 : p0 ≤ p1 pos : p0 < 0 ⊢ (𝓝ˢ ({c} ×ˢ closedBall 0 p0)).EventuallyEq (uncurry r0) (uncurry r1) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	set n := s.np c p	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s ⊢ ∃ r', Grow s c p (s.np c p) r'	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ ∃ r', Grow s c p n r'	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s ⊢ ∃ r', Grow s c p (s.np c p) r' TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	have m0 : (c, (0 : ℂ)) ∈ ({c} ×ˢ ball 0 p : Set (ℂ × ℂ)) := by simp only [mem_prod_eq, mem_singleton_iff, eq_self_iff_true, true_and_iff, mem_ball_self g.pos]	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) ⊢ ∃ r', Grow s c p n r'	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ ∃ r', Grow s c p n r'	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) ⊢ ∃ r', Grow s c p n r' TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	use curry b.u	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ ∃ r', Grow s c p n r'	case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ Grow s c p n (curry b.u)	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ ∃ r', Grow s c p n r' TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	exact { nonneg := g.pos.le zero := by rw [curry, b.uf.self_of_nhdsSet m0, uncurry, g.zero] start := by refine g.start.mp ((b.uf.filter_mono (nhds_le_nhdsSet m0)).mp (eventually_of_forall ?_)) intro x e b; simp only [curry, uncurry, Prod.mk.eta] at e ⊢; rw [e]; exact b eqn := by have fp := b.up simp only [closure_prod_eq, closure_singleton, closure_ball _ g.pos.ne'] at fp exact fp.mp (eventually_of_forall fun x e ↦ e.eqn.self_of_nhds) }	case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ Grow s c p n (curry b.u)	no goals	Please generate a tactic in lean4 to solve the state. STATE: case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ Grow s c p n (curry b.u) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [closure_prod_eq, closure_ball _ g.pos.ne', closure_singleton]	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ IsCompact (closure ({c} ×ˢ ball 0 p))	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ IsCompact ({c} ×ˢ closedBall 0 p)	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ IsCompact (closure ({c} ×ˢ ball 0 p)) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	exact isCompact_singleton.prod (isCompact_closedBall _ _)	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ IsCompact ({c} ×ˢ closedBall 0 p)	no goals	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ IsCompact ({c} ×ˢ closedBall 0 p) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	intro r0 r1 x e0 r01	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ ∀ {f_1 g : ℂ × ℂ → S} {x : ℂ × ℂ}, Eqns s n r (curry f_1) x → (𝓝 x).EventuallyEq f_1 g → Eqns s n r (curry g) x	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S x : ℂ × ℂ e0 : Eqns s n r (curry r0) x r01 : (𝓝 x).EventuallyEq r0 r1 ⊢ Eqns s n r (curry r1) x	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ ∀ {f_1 g : ℂ × ℂ → S} {x : ℂ × ℂ}, Eqns s n r (curry f_1) x → (𝓝 x).EventuallyEq f_1 g → Eqns s n r (curry g) x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	exact e0.congr (by simp only [Function.uncurry_curry, r01])	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S x : ℂ × ℂ e0 : Eqns s n r (curry r0) x r01 : (𝓝 x).EventuallyEq r0 r1 ⊢ Eqns s n r (curry r1) x	no goals	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S x : ℂ × ℂ e0 : Eqns s n r (curry r0) x r01 : (𝓝 x).EventuallyEq r0 r1 ⊢ Eqns s n r (curry r1) x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [Function.uncurry_curry, r01]	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S x : ℂ × ℂ e0 : Eqns s n r (curry r0) x r01 : (𝓝 x).EventuallyEq r0 r1 ⊢ (𝓝 x).EventuallyEq (uncurry (curry r0)) (uncurry (curry r1))	no goals	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S x : ℂ × ℂ e0 : Eqns s n r (curry r0) x r01 : (𝓝 x).EventuallyEq r0 r1 ⊢ (𝓝 x).EventuallyEq (uncurry (curry r0)) (uncurry (curry r1)) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [Filter.eventually_iff]	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ ∀ᶠ (x : ℂ × ℂ) in 𝓝ˢ ({c} ×ˢ ball 0 p), Eqns s n r (curry (uncurry r)) x	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ {x \| Eqns s n r (curry (uncurry r)) x} ∈ 𝓝ˢ ({c} ×ˢ ball 0 p)	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ ∀ᶠ (x : ℂ × ℂ) in 𝓝ˢ ({c} ×ˢ ball 0 p), Eqns s n r (curry (uncurry r)) x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	rw [mem_nhdsSet_iff_forall]	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ {x \| Eqns s n r (curry (uncurry r)) x} ∈ 𝓝ˢ ({c} ×ˢ ball 0 p)	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ ∀ x ∈ {c} ×ˢ ball 0 p, {x \| Eqns s n r (curry (uncurry r)) x} ∈ 𝓝 x	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ {x \| Eqns s n r (curry (uncurry r)) x} ∈ 𝓝ˢ ({c} ×ˢ ball 0 p) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	intro x m	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ ∀ x ∈ {c} ×ˢ ball 0 p, {x \| Eqns s n r (curry (uncurry r)) x} ∈ 𝓝 x	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p x : ℂ × ℂ m : x ∈ {c} ×ˢ ball 0 p ⊢ {x \| Eqns s n r (curry (uncurry r)) x} ∈ 𝓝 x	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ ∀ x ∈ {c} ×ˢ ball 0 p, {x \| Eqns s n r (curry (uncurry r)) x} ∈ 𝓝 x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	exact (g.eqn.filter_mono (nhds_le_nhdsSet m)).eventually_nhds.mp (eventually_of_forall fun y e ↦ { eqn := e start := by simp only [Function.curry_uncurry, Filter.EventuallyEq.refl, imp_true_iff] })	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p x : ℂ × ℂ m : x ∈ {c} ×ˢ ball 0 p ⊢ {x \| Eqns s n r (curry (uncurry r)) x} ∈ 𝓝 x	no goals	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p x : ℂ × ℂ m : x ∈ {c} ×ˢ ball 0 p ⊢ {x \| Eqns s n r (curry (uncurry r)) x} ∈ 𝓝 x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [Function.curry_uncurry, Filter.EventuallyEq.refl, imp_true_iff]	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p x : ℂ × ℂ m : x ∈ {c} ×ˢ ball 0 p y : ℂ × ℂ e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r x ⊢ y.2 = 0 → (𝓝 y).EventuallyEq (uncurry (curry (uncurry r))) (uncurry r)	no goals	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p x : ℂ × ℂ m : x ∈ {c} ×ˢ ball 0 p y : ℂ × ℂ e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r x ⊢ y.2 = 0 → (𝓝 y).EventuallyEq (uncurry (curry (uncurry r))) (uncurry r) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	intro ⟨c', x⟩ m	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ ∀ {x : ℂ × ℂ}, x ∈ closure ({c} ×ˢ ball 0 p) → ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 x, Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 x, z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : (c', x) ∈ closure ({c} ×ˢ ball 0 p) ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ ∀ {x : ℂ × ℂ}, x ∈ closure ({c} ×ˢ ball 0 p) → ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 x, Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 x, z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [closure_prod_eq, closure_ball _ g.pos.ne', closure_singleton, mem_prod_eq, mem_singleton_iff, mem_closedBall, Complex.dist_eq, sub_zero] at m	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : (c', x) ∈ closure ({c} ×ˢ ball 0 p) ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : (c', x) ∈ closure ({c} ×ˢ ball 0 p) ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	have ct : Tendsto (fun x ↦ (c, x)) (𝓝 x) (𝓝 (c, x)) := continuousAt_const.prod continuousAt_id	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	by_cases x0 : x ≠ 0	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z	case pos S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z case neg S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : ¬x ≠ 0 ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	rw [m.1]	case pos S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z	case pos S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z	Please generate a tactic in lean4 to solve the state. STATE: case pos S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	rcases g.point m.2 with ⟨r', e, rr⟩	case pos S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z	case pos.intro.intro S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z	Please generate a tactic in lean4 to solve the state. STATE: case pos S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	use uncurry r'	case pos.intro.intro S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z	case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry (uncurry r')) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), z ∈ {c} ×ˢ ball 0 p ∧ uncurry r' z = uncurry r z	Please generate a tactic in lean4 to solve the state. STATE: case pos.intro.intro S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	constructor	case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry (uncurry r')) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), z ∈ {c} ×ˢ ball 0 p ∧ uncurry r' z = uncurry r z	case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ ∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry (uncurry r')) z case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), z ∈ {c} ×ˢ ball 0 p ∧ uncurry r' z = uncurry r z	Please generate a tactic in lean4 to solve the state. STATE: case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry (uncurry r')) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), z ∈ {c} ×ˢ ball 0 p ∧ uncurry r' z = uncurry r z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	have t : ContinuousAt (fun y : ℂ × ℂ ↦ y.2) (c, x) := continuousAt_snd	case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ ∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry (uncurry r')) z	case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y t : ContinuousAt (fun y => y.2) (c, x) ⊢ ∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry (uncurry r')) z	Please generate a tactic in lean4 to solve the state. STATE: case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ ∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry (uncurry r')) z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	refine e.eventually_nhds.mp ((t.eventually_ne x0).mp (eventually_of_forall ?_))	case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y t : ContinuousAt (fun y => y.2) (c, x) ⊢ ∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry (uncurry r')) z	case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y t : ContinuousAt (fun y => y.2) (c, x) ⊢ ∀ (x : ℂ × ℂ), x.2 ≠ 0 → (∀ᶠ (x : ℂ × ℂ) in 𝓝 x, Eqn s (s.np c p) r' x) → Eqns s n r (curry (uncurry r')) x	Please generate a tactic in lean4 to solve the state. STATE: case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y t : ContinuousAt (fun y => y.2) (c, x) ⊢ ∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), Eqns s n r (curry (uncurry r')) z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	intro y y0 e	case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y t : ContinuousAt (fun y => y.2) (c, x) ⊢ ∀ (x : ℂ × ℂ), x.2 ≠ 0 → (∀ᶠ (x : ℂ × ℂ) in 𝓝 x, Eqn s (s.np c p) r' x) → Eqns s n r (curry (uncurry r')) x	case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e✝ : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y t : ContinuousAt (fun y => y.2) (c, x) y : ℂ × ℂ y0 : y.2 ≠ 0 e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r' x ⊢ Eqns s n r (curry (uncurry r')) y	Please generate a tactic in lean4 to solve the state. STATE: case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y t : ContinuousAt (fun y => y.2) (c, x) ⊢ ∀ (x : ℂ × ℂ), x.2 ≠ 0 → (∀ᶠ (x : ℂ × ℂ) in 𝓝 x, Eqn s (s.np c p) r' x) → Eqns s n r (curry (uncurry r')) x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	exact { eqn := e start := fun h ↦ (y0 h).elim }	case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e✝ : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y t : ContinuousAt (fun y => y.2) (c, x) y : ℂ × ℂ y0 : y.2 ≠ 0 e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r' x ⊢ Eqns s n r (curry (uncurry r')) y	no goals	Please generate a tactic in lean4 to solve the state. STATE: case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e✝ : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y t : ContinuousAt (fun y => y.2) (c, x) y : ℂ × ℂ y0 : y.2 ≠ 0 e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r' x ⊢ Eqns s n r (curry (uncurry r')) y TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	refine ct.frequently (rr.mp (eventually_of_forall ?_))	case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), z ∈ {c} ×ˢ ball 0 p ∧ uncurry r' z = uncurry r z	case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ ∀ (x : ℂ), x ∈ ball 0 p ∧ r' c x = r c x → (c, x) ∈ {c} ×ˢ ball 0 p ∧ uncurry r' (c, x) = uncurry r (c, x)	Please generate a tactic in lean4 to solve the state. STATE: case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, x), z ∈ {c} ×ˢ ball 0 p ∧ uncurry r' z = uncurry r z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	intro x ⟨m, e⟩	case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ ∀ (x : ℂ), x ∈ ball 0 p ∧ r' c x = r c x → (c, x) ∈ {c} ×ˢ ball 0 p ∧ uncurry r' (c, x) = uncurry r (c, x)	case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x✝ : ℂ m✝ : c' = c ∧ Complex.abs x✝ ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x✝) (𝓝 (c, x✝)) x0 : x✝ ≠ 0 r' : ℂ → ℂ → S e✝ : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x✝), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x✝, y ∈ ball 0 p ∧ r' c y = r c y x : ℂ m : x ∈ ball 0 p e : r' c x = r c x ⊢ (c, x) ∈ {c} ×ˢ ball 0 p ∧ uncurry r' (c, x) = uncurry r (c, x)	Please generate a tactic in lean4 to solve the state. STATE: case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x ≠ 0 r' : ℂ → ℂ → S e : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x, y ∈ ball 0 p ∧ r' c y = r c y ⊢ ∀ (x : ℂ), x ∈ ball 0 p ∧ r' c x = r c x → (c, x) ∈ {c} ×ˢ ball 0 p ∧ uncurry r' (c, x) = uncurry r (c, x) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [mem_prod_eq, mem_singleton_iff, eq_self_iff_true, true_and_iff]	case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x✝ : ℂ m✝ : c' = c ∧ Complex.abs x✝ ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x✝) (𝓝 (c, x✝)) x0 : x✝ ≠ 0 r' : ℂ → ℂ → S e✝ : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x✝), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x✝, y ∈ ball 0 p ∧ r' c y = r c y x : ℂ m : x ∈ ball 0 p e : r' c x = r c x ⊢ (c, x) ∈ {c} ×ˢ ball 0 p ∧ uncurry r' (c, x) = uncurry r (c, x)	case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x✝ : ℂ m✝ : c' = c ∧ Complex.abs x✝ ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x✝) (𝓝 (c, x✝)) x0 : x✝ ≠ 0 r' : ℂ → ℂ → S e✝ : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x✝), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x✝, y ∈ ball 0 p ∧ r' c y = r c y x : ℂ m : x ∈ ball 0 p e : r' c x = r c x ⊢ x ∈ ball 0 p ∧ uncurry r' (c, x) = uncurry r (c, x)	Please generate a tactic in lean4 to solve the state. STATE: case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x✝ : ℂ m✝ : c' = c ∧ Complex.abs x✝ ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x✝) (𝓝 (c, x✝)) x0 : x✝ ≠ 0 r' : ℂ → ℂ → S e✝ : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x✝), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x✝, y ∈ ball 0 p ∧ r' c y = r c y x : ℂ m : x ∈ ball 0 p e : r' c x = r c x ⊢ (c, x) ∈ {c} ×ˢ ball 0 p ∧ uncurry r' (c, x) = uncurry r (c, x) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	use m, e	case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x✝ : ℂ m✝ : c' = c ∧ Complex.abs x✝ ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x✝) (𝓝 (c, x✝)) x0 : x✝ ≠ 0 r' : ℂ → ℂ → S e✝ : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x✝), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x✝, y ∈ ball 0 p ∧ r' c y = r c y x : ℂ m : x ∈ ball 0 p e : r' c x = r c x ⊢ x ∈ ball 0 p ∧ uncurry r' (c, x) = uncurry r (c, x)	no goals	Please generate a tactic in lean4 to solve the state. STATE: case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x✝ : ℂ m✝ : c' = c ∧ Complex.abs x✝ ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x✝) (𝓝 (c, x✝)) x0 : x✝ ≠ 0 r' : ℂ → ℂ → S e✝ : ∀ᶠ (y : ℂ × ℂ) in 𝓝 (c, x✝), Eqn s (s.np c p) r' y rr : ∃ᶠ (y : ℂ) in 𝓝 x✝, y ∈ ball 0 p ∧ r' c y = r c y x : ℂ m : x ∈ ball 0 p e : r' c x = r c x ⊢ x ∈ ball 0 p ∧ uncurry r' (c, x) = uncurry r (c, x) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	use uncurry r	case neg S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : ¬x ≠ 0 ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z	case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : ¬x ≠ 0 ⊢ (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry (uncurry r)) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ uncurry r z = uncurry r z	Please generate a tactic in lean4 to solve the state. STATE: case neg S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : ¬x ≠ 0 ⊢ ∃ g, (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry g) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ g z = uncurry r z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [not_not] at x0	case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : ¬x ≠ 0 ⊢ (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry (uncurry r)) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ uncurry r z = uncurry r z	case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x = 0 ⊢ (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry (uncurry r)) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ uncurry r z = uncurry r z	Please generate a tactic in lean4 to solve the state. STATE: case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : ¬x ≠ 0 ⊢ (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry (uncurry r)) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ uncurry r z = uncurry r z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [m.1, x0, eq_self_iff_true, and_true_iff] at ct ⊢	case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x = 0 ⊢ (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry (uncurry r)) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ uncurry r z = uncurry r z	case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, 0), Eqns s n r (curry (uncurry r)) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, 0), z ∈ {c} ×ˢ ball 0 p	Please generate a tactic in lean4 to solve the state. STATE: case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p ct : Tendsto (fun x => (c, x)) (𝓝 x) (𝓝 (c, x)) x0 : x = 0 ⊢ (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), Eqns s n r (curry (uncurry r)) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c', x), z ∈ {c} ×ˢ ball 0 p ∧ uncurry r z = uncurry r z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	constructor	case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, 0), Eqns s n r (curry (uncurry r)) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, 0), z ∈ {c} ×ˢ ball 0 p	case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ ∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, 0), Eqns s n r (curry (uncurry r)) z case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, 0), z ∈ {c} ×ˢ ball 0 p	Please generate a tactic in lean4 to solve the state. STATE: case h S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ (∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, 0), Eqns s n r (curry (uncurry r)) z) ∧ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, 0), z ∈ {c} ×ˢ ball 0 p TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	refine (g.eqn.filter_mono (nhds_le_nhdsSet ?_)).eventually_nhds.mp (eventually_of_forall fun y e ↦ ?_)	case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ ∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, 0), Eqns s n r (curry (uncurry r)) z	case h.left.refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ (c, 0) ∈ {c} ×ˢ ball 0 p case h.left.refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) y : ℂ × ℂ e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r x ⊢ Eqns s n r (curry (uncurry r)) y	Please generate a tactic in lean4 to solve the state. STATE: case h.left S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ ∀ᶠ (z : ℂ × ℂ) in 𝓝 (c, 0), Eqns s n r (curry (uncurry r)) z TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	use rfl, mem_ball_self g.pos	case h.left.refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ (c, 0) ∈ {c} ×ˢ ball 0 p case h.left.refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) y : ℂ × ℂ e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r x ⊢ Eqns s n r (curry (uncurry r)) y	case h.left.refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) y : ℂ × ℂ e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r x ⊢ Eqns s n r (curry (uncurry r)) y	Please generate a tactic in lean4 to solve the state. STATE: case h.left.refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ (c, 0) ∈ {c} ×ˢ ball 0 p case h.left.refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) y : ℂ × ℂ e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r x ⊢ Eqns s n r (curry (uncurry r)) y TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [Function.curry_uncurry]	case h.left.refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) y : ℂ × ℂ e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r x ⊢ Eqns s n r (curry (uncurry r)) y	case h.left.refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) y : ℂ × ℂ e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r x ⊢ Eqns s n r r y	Please generate a tactic in lean4 to solve the state. STATE: case h.left.refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) y : ℂ × ℂ e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r x ⊢ Eqns s n r (curry (uncurry r)) y TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	exact { eqn := e start := by simp only [Filter.EventuallyEq.refl, imp_true_iff, Filter.eventually_true] }	case h.left.refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) y : ℂ × ℂ e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r x ⊢ Eqns s n r r y	no goals	Please generate a tactic in lean4 to solve the state. STATE: case h.left.refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) y : ℂ × ℂ e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r x ⊢ Eqns s n r r y TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [Filter.EventuallyEq.refl, imp_true_iff, Filter.eventually_true]	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) y : ℂ × ℂ e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r x ⊢ y.2 = 0 → (𝓝 y).EventuallyEq (uncurry r) (uncurry r)	no goals	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) y : ℂ × ℂ e : ∀ᶠ (x : ℂ × ℂ) in 𝓝 y, Eqn s (s.np c p) r x ⊢ y.2 = 0 → (𝓝 y).EventuallyEq (uncurry r) (uncurry r) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	refine ct.frequently (Filter.Eventually.frequently ?_)	case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, 0), z ∈ {c} ×ˢ ball 0 p	case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ ∀ᶠ (x : ℂ) in 𝓝 0, (c, x) ∈ {c} ×ˢ ball 0 p	Please generate a tactic in lean4 to solve the state. STATE: case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ ∃ᶠ (z : ℂ × ℂ) in 𝓝 (c, 0), z ∈ {c} ×ˢ ball 0 p TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [mem_prod_eq, mem_singleton_iff, eq_self_iff_true, true_and_iff]	case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ ∀ᶠ (x : ℂ) in 𝓝 0, (c, x) ∈ {c} ×ˢ ball 0 p	case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ ∀ᶠ (x : ℂ) in 𝓝 0, x ∈ ball 0 p	Please generate a tactic in lean4 to solve the state. STATE: case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ ∀ᶠ (x : ℂ) in 𝓝 0, (c, x) ∈ {c} ×ˢ ball 0 p TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	exact isOpen_ball.eventually_mem (mem_ball_self g.pos)	case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ ∀ᶠ (x : ℂ) in 𝓝 0, x ∈ ball 0 p	no goals	Please generate a tactic in lean4 to solve the state. STATE: case h.right S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p c' x : ℂ m : c' = c ∧ Complex.abs x ≤ p x0 : x = 0 ct : Tendsto (fun x => (c, x)) (𝓝 0) (𝓝 (c, 0)) ⊢ ∀ᶠ (x : ℂ) in 𝓝 0, x ∈ ball 0 p TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	intro r0 r1 t _ pre e0 e1 r01	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ ∀ {f0 f1 : ℂ × ℂ → S} {t : Set (ℂ × ℂ)}, IsOpen t → IsPreconnected t → (∀ x ∈ t, Eqns s n r (curry f0) x) → (∀ x ∈ t, Eqns s n r (curry f1) x) → (∃ x ∈ t, f0 x = f1 x) → EqOn f0 f1 t	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ EqOn r0 r1 t	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p ⊢ ∀ {f0 f1 : ℂ × ℂ → S} {t : Set (ℂ × ℂ)}, IsOpen t → IsPreconnected t → (∀ x ∈ t, Eqns s n r (curry f0) x) → (∀ x ∈ t, Eqns s n r (curry f1) x) → (∃ x ∈ t, f0 x = f1 x) → EqOn f0 f1 t TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	have u := eqns_unique pre e0 e1 ?_	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ EqOn r0 r1 t	case refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x u : EqOn (uncurry (curry r0)) (uncurry (curry r1)) t ⊢ EqOn r0 r1 t case refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ ∃ x ∈ t, uncurry (curry r0) x = uncurry (curry r1) x	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ EqOn r0 r1 t TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [Function.uncurry_curry] at u	case refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x u : EqOn (uncurry (curry r0)) (uncurry (curry r1)) t ⊢ EqOn r0 r1 t case refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ ∃ x ∈ t, uncurry (curry r0) x = uncurry (curry r1) x	case refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x u : EqOn r0 r1 t ⊢ EqOn r0 r1 t case refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ ∃ x ∈ t, uncurry (curry r0) x = uncurry (curry r1) x	Please generate a tactic in lean4 to solve the state. STATE: case refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x u : EqOn (uncurry (curry r0)) (uncurry (curry r1)) t ⊢ EqOn r0 r1 t case refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ ∃ x ∈ t, uncurry (curry r0) x = uncurry (curry r1) x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	exact u	case refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x u : EqOn r0 r1 t ⊢ EqOn r0 r1 t case refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ ∃ x ∈ t, uncurry (curry r0) x = uncurry (curry r1) x	case refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ ∃ x ∈ t, uncurry (curry r0) x = uncurry (curry r1) x	Please generate a tactic in lean4 to solve the state. STATE: case refine_2 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x u : EqOn r0 r1 t ⊢ EqOn r0 r1 t case refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ ∃ x ∈ t, uncurry (curry r0) x = uncurry (curry r1) x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [Function.uncurry_curry]	case refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ ∃ x ∈ t, uncurry (curry r0) x = uncurry (curry r1) x	case refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ ∃ x ∈ t, r0 x = r1 x	Please generate a tactic in lean4 to solve the state. STATE: case refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ ∃ x ∈ t, uncurry (curry r0) x = uncurry (curry r1) x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	exact r01	case refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ ∃ x ∈ t, r0 x = r1 x	no goals	Please generate a tactic in lean4 to solve the state. STATE: case refine_1 S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p r0 r1 : ℂ × ℂ → S t : Set (ℂ × ℂ) a✝ : IsOpen t pre : IsPreconnected t e0 : ∀ x ∈ t, Eqns s n r (curry r0) x e1 : ∀ x ∈ t, Eqns s n r (curry r1) x r01 : ∃ x ∈ t, r0 x = r1 x ⊢ ∃ x ∈ t, r0 x = r1 x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [mem_prod_eq, mem_singleton_iff, eq_self_iff_true, true_and_iff, mem_ball_self g.pos]	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) ⊢ (c, 0) ∈ {c} ×ˢ ball 0 p	no goals	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) ⊢ (c, 0) ∈ {c} ×ˢ ball 0 p TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	rw [curry, b.uf.self_of_nhdsSet m0, uncurry, g.zero]	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ curry b.u c 0 = a	no goals	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ curry b.u c 0 = a TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	refine g.start.mp ((b.uf.filter_mono (nhds_le_nhdsSet m0)).mp (eventually_of_forall ?_))	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ ∀ᶠ (x : ℂ × ℂ) in 𝓝 (c, 0), s.bottcherNear x.1 (curry b.u x.1 x.2) = x.2	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ ∀ (x : ℂ × ℂ), b.u x = uncurry r x → s.bottcherNear x.1 (r x.1 x.2) = x.2 → s.bottcherNear x.1 (curry b.u x.1 x.2) = x.2	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ ∀ᶠ (x : ℂ × ℂ) in 𝓝 (c, 0), s.bottcherNear x.1 (curry b.u x.1 x.2) = x.2 TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	intro x e b	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ ∀ (x : ℂ × ℂ), b.u x = uncurry r x → s.bottcherNear x.1 (r x.1 x.2) = x.2 → s.bottcherNear x.1 (curry b.u x.1 x.2) = x.2	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b✝ : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p x : ℂ × ℂ e : b✝.u x = uncurry r x b : s.bottcherNear x.1 (r x.1 x.2) = x.2 ⊢ s.bottcherNear x.1 (curry b✝.u x.1 x.2) = x.2	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ ∀ (x : ℂ × ℂ), b.u x = uncurry r x → s.bottcherNear x.1 (r x.1 x.2) = x.2 → s.bottcherNear x.1 (curry b.u x.1 x.2) = x.2 TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [curry, uncurry, Prod.mk.eta] at e ⊢	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b✝ : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p x : ℂ × ℂ e : b✝.u x = uncurry r x b : s.bottcherNear x.1 (r x.1 x.2) = x.2 ⊢ s.bottcherNear x.1 (curry b✝.u x.1 x.2) = x.2	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b✝ : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p x : ℂ × ℂ e : b✝.u x = r x.1 x.2 b : s.bottcherNear x.1 (r x.1 x.2) = x.2 ⊢ s.bottcherNear x.1 (b✝.u x) = x.2	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b✝ : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p x : ℂ × ℂ e : b✝.u x = uncurry r x b : s.bottcherNear x.1 (r x.1 x.2) = x.2 ⊢ s.bottcherNear x.1 (curry b✝.u x.1 x.2) = x.2 TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	rw [e]	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b✝ : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p x : ℂ × ℂ e : b✝.u x = r x.1 x.2 b : s.bottcherNear x.1 (r x.1 x.2) = x.2 ⊢ s.bottcherNear x.1 (b✝.u x) = x.2	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b✝ : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p x : ℂ × ℂ e : b✝.u x = r x.1 x.2 b : s.bottcherNear x.1 (r x.1 x.2) = x.2 ⊢ s.bottcherNear x.1 (r x.1 x.2) = x.2	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b✝ : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p x : ℂ × ℂ e : b✝.u x = r x.1 x.2 b : s.bottcherNear x.1 (r x.1 x.2) = x.2 ⊢ s.bottcherNear x.1 (b✝.u x) = x.2 TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	exact b	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b✝ : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p x : ℂ × ℂ e : b✝.u x = r x.1 x.2 b : s.bottcherNear x.1 (r x.1 x.2) = x.2 ⊢ s.bottcherNear x.1 (r x.1 x.2) = x.2	no goals	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b✝ : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p x : ℂ × ℂ e : b✝.u x = r x.1 x.2 b : s.bottcherNear x.1 (r x.1 x.2) = x.2 ⊢ s.bottcherNear x.1 (r x.1 x.2) = x.2 TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	have fp := b.up	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ ∀ᶠ (x : ℂ × ℂ) in 𝓝ˢ ({c} ×ˢ closedBall 0 p), Eqn s n (curry b.u) x	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p fp : ∀ᶠ (z : ℂ × ℂ) in 𝓝ˢ (closure ({c} ×ˢ ball 0 p)), Eqns s n r (curry b.u) z ⊢ ∀ᶠ (x : ℂ × ℂ) in 𝓝ˢ ({c} ×ˢ closedBall 0 p), Eqn s n (curry b.u) x	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p ⊢ ∀ᶠ (x : ℂ × ℂ) in 𝓝ˢ ({c} ×ˢ closedBall 0 p), Eqn s n (curry b.u) x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	simp only [closure_prod_eq, closure_singleton, closure_ball _ g.pos.ne'] at fp	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p fp : ∀ᶠ (z : ℂ × ℂ) in 𝓝ˢ (closure ({c} ×ˢ ball 0 p)), Eqns s n r (curry b.u) z ⊢ ∀ᶠ (x : ℂ × ℂ) in 𝓝ˢ ({c} ×ˢ closedBall 0 p), Eqn s n (curry b.u) x	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p fp : ∀ᶠ (z : ℂ × ℂ) in 𝓝ˢ ({c} ×ˢ closedBall 0 p), Eqns s n r (curry b.u) z ⊢ ∀ᶠ (x : ℂ × ℂ) in 𝓝ˢ ({c} ×ˢ closedBall 0 p), Eqn s n (curry b.u) x	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p fp : ∀ᶠ (z : ℂ × ℂ) in 𝓝ˢ (closure ({c} ×ˢ ball 0 p)), Eqns s n r (curry b.u) z ⊢ ∀ᶠ (x : ℂ × ℂ) in 𝓝ˢ ({c} ×ˢ closedBall 0 p), Eqn s n (curry b.u) x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	GrowOpen.grow	[436, 1]	[498, 74]	exact fp.mp (eventually_of_forall fun x e ↦ e.eqn.self_of_nhds)	S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p fp : ∀ᶠ (z : ℂ × ℂ) in 𝓝ˢ ({c} ×ˢ closedBall 0 p), Eqns s n r (curry b.u) z ⊢ ∀ᶠ (x : ℂ × ℂ) in 𝓝ˢ ({c} ×ˢ closedBall 0 p), Eqn s n (curry b.u) x	no goals	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : CompactSpace S inst✝³ : T3Space S inst✝² : ChartedSpace ℂ S inst✝¹ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p : ℝ s : Super f d a r : ℂ → ℂ → S g : GrowOpen s c p r inst✝ : OnePreimage s n : ℕ := s.np c p b : Base (fun f_1 x => Eqns s n r (curry f_1) x) ({c} ×ˢ ball 0 p) (uncurry r) m0 : (c, 0) ∈ {c} ×ˢ ball 0 p fp : ∀ᶠ (z : ℂ × ℂ) in 𝓝ˢ ({c} ×ˢ closedBall 0 p), Eqns s n r (curry b.u) z ⊢ ∀ᶠ (x : ℂ × ℂ) in 𝓝ˢ ({c} ×ˢ closedBall 0 p), Eqn s n (curry b.u) x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	have above : ∀ k, p k ≤ ps := fun k ↦ mono.ge_of_tendsto tend k	S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) ⊢ ∃ rs, ∀ (k : ℕ) (x : ℂ), Complex.abs x < p k → (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k))	S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps ⊢ ∃ rs, ∀ (k : ℕ) (x : ℂ), Complex.abs x < p k → (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k))	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) ⊢ ∃ rs, ∀ (k : ℕ) (x : ℂ), Complex.abs x < p k → (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k)) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	generalize hrs : (fun e x : ℂ ↦ if h : abs x < ps then r (Nat.find (tend.exists_lt h)) e x else a) = rs	S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps ⊢ ∃ rs, ∀ (k : ℕ) (x : ℂ), Complex.abs x < p k → (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k))	S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs ⊢ ∃ rs, ∀ (k : ℕ) (x : ℂ), Complex.abs x < p k → (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k))	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps ⊢ ∃ rs, ∀ (k : ℕ) (x : ℂ), Complex.abs x < p k → (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k)) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	use rs	S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs ⊢ ∃ rs, ∀ (k : ℕ) (x : ℂ), Complex.abs x < p k → (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k))	case h S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs ⊢ ∀ (k : ℕ) (x : ℂ), Complex.abs x < p k → (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k))	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs ⊢ ∃ rs, ∀ (k : ℕ) (x : ℂ), Complex.abs x < p k → (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k)) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	intro k x xk	case h S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x ⊢ ∀ (k : ℕ) (x : ℂ), Complex.abs x < p k → (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k))	case h S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k ⊢ (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k))	Please generate a tactic in lean4 to solve the state. STATE: case h S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x ⊢ ∀ (k : ℕ) (x : ℂ), Complex.abs x < p k → (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k)) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	rcases eventually_nhds_iff.mp (loc k) with ⟨u, eq, uo, uc⟩	case h S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k ⊢ (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k))	case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u ⊢ (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k))	Please generate a tactic in lean4 to solve the state. STATE: case h S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k ⊢ (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k)) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	have m : u ×ˢ ball (0 : ℂ) (p k) ∈ 𝓝 (c, x) := by refine prod_mem_nhds (uo.mem_nhds uc) (isOpen_ball.mem_nhds ?_) simp only [mem_ball, Complex.dist_eq, sub_zero, xk]	case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u ⊢ (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k))	case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u m : u ×ˢ ball 0 (p k) ∈ 𝓝 (c, x) ⊢ (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k))	Please generate a tactic in lean4 to solve the state. STATE: case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u ⊢ (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k)) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	apply Filter.eventually_of_mem m	case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u m : u ×ˢ ball 0 (p k) ∈ 𝓝 (c, x) ⊢ (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k))	case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u m : u ×ˢ ball 0 (p k) ∈ 𝓝 (c, x) ⊢ ∀ x ∈ u ×ˢ ball 0 (p k), uncurry rs x = uncurry (r k) x	Please generate a tactic in lean4 to solve the state. STATE: case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u m : u ×ˢ ball 0 (p k) ∈ 𝓝 (c, x) ⊢ (𝓝 (c, x)).EventuallyEq (uncurry rs) (uncurry (r k)) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	intro ⟨e, y⟩ ⟨m0, m1⟩	case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u m : u ×ˢ ball 0 (p k) ∈ 𝓝 (c, x) ⊢ ∀ x ∈ u ×ˢ ball 0 (p k), uncurry rs x = uncurry (r k) x	case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u m : u ×ˢ ball 0 (p k) ∈ 𝓝 (c, x) e y : ℂ m0 : (e, y).1 ∈ u m1 : (e, y).2 ∈ ball 0 (p k) ⊢ uncurry rs (e, y) = uncurry (r k) (e, y)	Please generate a tactic in lean4 to solve the state. STATE: case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u m : u ×ˢ ball 0 (p k) ∈ 𝓝 (c, x) ⊢ ∀ x ∈ u ×ˢ ball 0 (p k), uncurry rs x = uncurry (r k) x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	simp only [mem_ball, Complex.dist_eq, sub_zero] at m1	case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u m : u ×ˢ ball 0 (p k) ∈ 𝓝 (c, x) e y : ℂ m0 : (e, y).1 ∈ u m1 : (e, y).2 ∈ ball 0 (p k) ⊢ uncurry rs (e, y) = uncurry (r k) (e, y)	case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u m : u ×ˢ ball 0 (p k) ∈ 𝓝 (c, x) e y : ℂ m0 : (e, y).1 ∈ u m1 : Complex.abs y < p k ⊢ uncurry rs (e, y) = uncurry (r k) (e, y)	Please generate a tactic in lean4 to solve the state. STATE: case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u m : u ×ˢ ball 0 (p k) ∈ 𝓝 (c, x) e y : ℂ m0 : (e, y).1 ∈ u m1 : (e, y).2 ∈ ball 0 (p k) ⊢ uncurry rs (e, y) = uncurry (r k) (e, y) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	exact eq _ m0 _ m1	case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u m : u ×ˢ ball 0 (p k) ∈ 𝓝 (c, x) e y : ℂ m0 : (e, y).1 ∈ u m1 : Complex.abs y < p k ⊢ uncurry rs (e, y) = uncurry (r k) (e, y)	no goals	Please generate a tactic in lean4 to solve the state. STATE: case h.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs loc : ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x k : ℕ x : ℂ xk : Complex.abs x < p k u : Set ℂ eq : ∀ x ∈ u, ∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1 uo : IsOpen u uc : c ∈ u m : u ×ˢ ball 0 (p k) ∈ 𝓝 (c, x) e y : ℂ m0 : (e, y).1 ∈ u m1 : Complex.abs y < p k ⊢ uncurry rs (e, y) = uncurry (r k) (e, y) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	intro k	S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs ⊢ ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x	S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs ⊢ ∀ (k : ℕ), ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	induction' k with k h	S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x	case zero S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p 0 → rs e x = r 0 e x case succ S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p (k + 1) → rs e x = r (k + 1) e x	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	apply eventually_of_forall	case zero S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p 0 → rs e x = r 0 e x	case zero.hp S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs ⊢ ∀ (x x_1 : ℂ), Complex.abs x_1 < p 0 → rs x x_1 = r 0 x x_1	Please generate a tactic in lean4 to solve the state. STATE: case zero S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p 0 → rs e x = r 0 e x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	intro e x x0	case zero.hp S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs ⊢ ∀ (x x_1 : ℂ), Complex.abs x_1 < p 0 → rs x x_1 = r 0 x x_1	case zero.hp S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs e x : ℂ x0 : Complex.abs x < p 0 ⊢ rs e x = r 0 e x	Please generate a tactic in lean4 to solve the state. STATE: case zero.hp S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs ⊢ ∀ (x x_1 : ℂ), Complex.abs x_1 < p 0 → rs x x_1 = r 0 x x_1 TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	have xe : ∃ k, abs x < p k := ⟨0, x0⟩	case zero.hp S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs e x : ℂ x0 : Complex.abs x < p 0 ⊢ rs e x = r 0 e x	case zero.hp S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs e x : ℂ x0 : Complex.abs x < p 0 xe : ∃ k, Complex.abs x < p k ⊢ rs e x = r 0 e x	Please generate a tactic in lean4 to solve the state. STATE: case zero.hp S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs e x : ℂ x0 : Complex.abs x < p 0 ⊢ rs e x = r 0 e x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	simp only [← hrs, lt_of_lt_of_le x0 (above _), dif_pos, (Nat.find_eq_zero xe).mpr x0]	case zero.hp S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs e x : ℂ x0 : Complex.abs x < p 0 xe : ∃ k, Complex.abs x < p k ⊢ rs e x = r 0 e x	no goals	Please generate a tactic in lean4 to solve the state. STATE: case zero.hp S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs e x : ℂ x0 : Complex.abs x < p 0 xe : ∃ k, Complex.abs x < p k ⊢ rs e x = r 0 e x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	have eq := (g k).unique (g (k + 1)) (mono (Nat.lt_succ_self _).le)	case succ S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p (k + 1) → rs e x = r (k + 1) e x	case succ S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq : (𝓝ˢ ({c} ×ˢ closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p (k + 1) → rs e x = r (k + 1) e x	Please generate a tactic in lean4 to solve the state. STATE: case succ S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p (k + 1) → rs e x = r (k + 1) e x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	simp only [isCompact_singleton.nhdsSet_prod_eq (isCompact_closedBall _ _)] at eq	case succ S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq : (𝓝ˢ ({c} ×ˢ closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p (k + 1) → rs e x = r (k + 1) e x	case succ S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p (k + 1) → rs e x = r (k + 1) e x	Please generate a tactic in lean4 to solve the state. STATE: case succ S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq : (𝓝ˢ ({c} ×ˢ closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p (k + 1) → rs e x = r (k + 1) e x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	apply h.mp	case succ S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p (k + 1) → rs e x = r (k + 1) e x	case succ S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) ⊢ ∀ᶠ (x : ℂ) in 𝓝 c, (∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1) → ∀ (x_1 : ℂ), Complex.abs x_1 < p (k + 1) → rs x x_1 = r (k + 1) x x_1	Please generate a tactic in lean4 to solve the state. STATE: case succ S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) ⊢ ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p (k + 1) → rs e x = r (k + 1) e x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	rcases Filter.mem_prod_iff.mp eq with ⟨u0, n0, u1, n1, eq⟩	case succ S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) ⊢ ∀ᶠ (x : ℂ) in 𝓝 c, (∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1) → ∀ (x_1 : ℂ), Complex.abs x_1 < p (k + 1) → rs x x_1 = r (k + 1) x x_1	case succ.intro.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 : Set ℂ n0 : u0 ∈ 𝓝ˢ {c} u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} ⊢ ∀ᶠ (x : ℂ) in 𝓝 c, (∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1) → ∀ (x_1 : ℂ), Complex.abs x_1 < p (k + 1) → rs x x_1 = r (k + 1) x x_1	Please generate a tactic in lean4 to solve the state. STATE: case succ S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) ⊢ ∀ᶠ (x : ℂ) in 𝓝 c, (∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1) → ∀ (x_1 : ℂ), Complex.abs x_1 < p (k + 1) → rs x x_1 = r (k + 1) x x_1 TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	simp only [nhdsSet_singleton] at n0	case succ.intro.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 : Set ℂ n0 : u0 ∈ 𝓝ˢ {c} u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} ⊢ ∀ᶠ (x : ℂ) in 𝓝 c, (∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1) → ∀ (x_1 : ℂ), Complex.abs x_1 < p (k + 1) → rs x x_1 = r (k + 1) x x_1	case succ.intro.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c ⊢ ∀ᶠ (x : ℂ) in 𝓝 c, (∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1) → ∀ (x_1 : ℂ), Complex.abs x_1 < p (k + 1) → rs x x_1 = r (k + 1) x x_1	Please generate a tactic in lean4 to solve the state. STATE: case succ.intro.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 : Set ℂ n0 : u0 ∈ 𝓝ˢ {c} u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} ⊢ ∀ᶠ (x : ℂ) in 𝓝 c, (∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1) → ∀ (x_1 : ℂ), Complex.abs x_1 < p (k + 1) → rs x x_1 = r (k + 1) x x_1 TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	refine Filter.eventually_of_mem n0 fun e eu h x xk1 ↦ ?_	case succ.intro.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c ⊢ ∀ᶠ (x : ℂ) in 𝓝 c, (∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1) → ∀ (x_1 : ℂ), Complex.abs x_1 < p (k + 1) → rs x x_1 = r (k + 1) x x_1	case succ.intro.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) ⊢ rs e x = r (k + 1) e x	Please generate a tactic in lean4 to solve the state. STATE: case succ.intro.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c ⊢ ∀ᶠ (x : ℂ) in 𝓝 c, (∀ (x_1 : ℂ), Complex.abs x_1 < p k → rs x x_1 = r k x x_1) → ∀ (x_1 : ℂ), Complex.abs x_1 < p (k + 1) → rs x x_1 = r (k + 1) x x_1 TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	by_cases xk0 : abs x < p k	case succ.intro.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) ⊢ rs e x = r (k + 1) e x	case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k ⊢ rs e x = r (k + 1) e x case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : ¬Complex.abs x < p k ⊢ rs e x = r (k + 1) e x	Please generate a tactic in lean4 to solve the state. STATE: case succ.intro.intro.intro.intro S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) ⊢ rs e x = r (k + 1) e x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	have m : (e, x) ∈ u0 ×ˢ u1 := by refine mk_mem_prod eu (subset_of_mem_nhdsSet n1 ?_) simp only [mem_closedBall, Complex.dist_eq, sub_zero, xk0.le]	case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k ⊢ rs e x = r (k + 1) e x	case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k m : (e, x) ∈ u0 ×ˢ u1 ⊢ rs e x = r (k + 1) e x	Please generate a tactic in lean4 to solve the state. STATE: case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k ⊢ rs e x = r (k + 1) e x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	specialize eq m	case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k m : (e, x) ∈ u0 ×ˢ u1 ⊢ rs e x = r (k + 1) e x	case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k m : (e, x) ∈ u0 ×ˢ u1 eq : (e, x) ∈ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} ⊢ rs e x = r (k + 1) e x	Please generate a tactic in lean4 to solve the state. STATE: case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k m : (e, x) ∈ u0 ×ˢ u1 ⊢ rs e x = r (k + 1) e x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	simp only [mem_setOf, uncurry] at eq	case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k m : (e, x) ∈ u0 ×ˢ u1 eq : (e, x) ∈ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} ⊢ rs e x = r (k + 1) e x	case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k m : (e, x) ∈ u0 ×ˢ u1 eq : r k e x = r (k + 1) e x ⊢ rs e x = r (k + 1) e x	Please generate a tactic in lean4 to solve the state. STATE: case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k m : (e, x) ∈ u0 ×ˢ u1 eq : (e, x) ∈ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} ⊢ rs e x = r (k + 1) e x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	rw [h _ xk0, eq]	case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k m : (e, x) ∈ u0 ×ˢ u1 eq : r k e x = r (k + 1) e x ⊢ rs e x = r (k + 1) e x	no goals	Please generate a tactic in lean4 to solve the state. STATE: case pos S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k m : (e, x) ∈ u0 ×ˢ u1 eq : r k e x = r (k + 1) e x ⊢ rs e x = r (k + 1) e x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	refine mk_mem_prod eu (subset_of_mem_nhdsSet n1 ?_)	S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k ⊢ (e, x) ∈ u0 ×ˢ u1	S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k ⊢ x ∈ closedBall 0 (p k)	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k ⊢ (e, x) ∈ u0 ×ˢ u1 TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	simp only [mem_closedBall, Complex.dist_eq, sub_zero, xk0.le]	S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k ⊢ x ∈ closedBall 0 (p k)	no goals	Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : Complex.abs x < p k ⊢ x ∈ closedBall 0 (p k) TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	have xe : ∃ k, abs x < p k := ⟨k + 1, xk1⟩	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : ¬Complex.abs x < p k ⊢ rs e x = r (k + 1) e x	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : ¬Complex.abs x < p k xe : ∃ k, Complex.abs x < p k ⊢ rs e x = r (k + 1) e x	Please generate a tactic in lean4 to solve the state. STATE: case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : ¬Complex.abs x < p k ⊢ rs e x = r (k + 1) e x TACTIC:
https://github.com/girving/ray.git	0be790285dd0fce78913b0cb9bddaffa94bd25f9	Ray/Dynamics/Grow.lean	join_r	[502, 1]	[541, 21]	have n := (Nat.find_eq_iff xe).mpr ⟨xk1, ?_⟩	case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : ¬Complex.abs x < p k xe : ∃ k, Complex.abs x < p k ⊢ rs e x = r (k + 1) e x	case neg.refine_2 S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝¹ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n✝ : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n✝ k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : ¬Complex.abs x < p k xe : ∃ k, Complex.abs x < p k n : Nat.find xe = k + 1 ⊢ rs e x = r (k + 1) e x case neg.refine_1 S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : ¬Complex.abs x < p k xe : ∃ k, Complex.abs x < p k ⊢ ∀ n < k + 1, ¬Complex.abs x < p n	Please generate a tactic in lean4 to solve the state. STATE: case neg S : Type inst✝⁴ : TopologicalSpace S inst✝³ : CompactSpace S inst✝² : T3Space S inst✝¹ : ChartedSpace ℂ S inst✝ : AnalyticManifold I S f : ℂ → S → S c : ℂ a z : S d n✝ : ℕ p✝ : ℝ s✝ : Super f d a r✝ : ℂ → ℂ → S s : Super f d a p : ℕ → ℝ n : ℕ → ℕ ps : ℝ r : ℕ → ℂ → ℂ → S g : ∀ (k : ℕ), Grow s c (p k) (n k) (r k) mono : Monotone p tend : Tendsto p atTop (𝓝 ps) above : ∀ (k : ℕ), p k ≤ ps rs : ℂ → ℂ → S hrs : (fun e x => if h : Complex.abs x < ps then r (Nat.find ⋯) e x else a) = rs k : ℕ h✝ : ∀ᶠ (e : ℂ) in 𝓝 c, ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x eq✝ : (𝓝ˢ {c} ×ˢ 𝓝ˢ (closedBall 0 (p k))).EventuallyEq (uncurry (r k)) (uncurry (r (k + 1))) u0 u1 : Set ℂ n1 : u1 ∈ 𝓝ˢ (closedBall 0 (p k)) eq : u0 ×ˢ u1 ⊆ {x \| (fun x => uncurry (r k) x = uncurry (r (k + 1)) x) x} n0 : u0 ∈ 𝓝 c e : ℂ eu : e ∈ u0 h : ∀ (x : ℂ), Complex.abs x < p k → rs e x = r k e x x : ℂ xk1 : Complex.abs x < p (k + 1) xk0 : ¬Complex.abs x < p k xe : ∃ k, Complex.abs x < p k ⊢ rs e x = r (k + 1) e x TACTIC:

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