Datasets:
pkuAI4M
/
lean_github

Dataset card Data Studio Files
xet
 Community
1
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/AnalyticManifold/RiemannSphere.lean
RiemannSphere.continuous_lift'
[529, 1]
[535, 49]
apply ContinuousAt.continuousWithinAt
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z✝ : ℂ gc : Continuous (uncurry g) gi : ∀ (x : X), Tendsto (uncurry g) ((𝓝 x).prod atInf) atInf x : X z : 𝕊 a✝ : (...
case h X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z✝ : ℂ gc : Continuous (uncurry g) gi : ∀ (x : X), Tendsto (uncurry g) ((𝓝 x).prod atInf) atInf x : X z : 𝕊...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z✝ : ℂ gc : Continuous (uncurry g) gi : ∀ (x : X), Tend...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.continuous_lift'
[529, 1]
[535, 49]
induction z using OnePoint.rec
case h X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z✝ : ℂ gc : Continuous (uncurry g) gi : ∀ (x : X), Tendsto (uncurry g) ((𝓝 x).prod atInf) atInf x : X z : 𝕊...
case h.h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z : ℂ gc : Continuous (uncurry g) gi : ∀ (x : X), Tendsto (uncurry g) ((𝓝 x).prod atInf) atInf x : X a✝ :...
Please generate a tactic in lean4 to solve the state. STATE: case h X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z✝ : ℂ gc : Continuous (uncurry g) gi : ∀ (x : X...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.continuous_lift'
[529, 1]
[535, 49]
exact continuousAt_lift_inf' (gi x)
case h.h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z : ℂ gc : Continuous (uncurry g) gi : ∀ (x : X), Tendsto (uncurry g) ((𝓝 x).prod atInf) atInf x : X a✝ :...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case h.h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z : ℂ gc : Continuous (uncurry g) gi : ∀ (x :...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.continuous_lift'
[529, 1]
[535, 49]
exact continuousAt_lift_coe' gc.continuousAt
case h.h₂ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝¹ : X z : ℂ gc : Continuous (uncurry g) gi : ∀ (x : X), Tendsto (uncurry g) ((𝓝 x).prod atInf) atInf x : X x✝ ...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case h.h₂ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝¹ : X z : ℂ gc : Continuous (uncurry g) gi : ∀ (x ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.continuousAt_lift_coe
[538, 1]
[541, 90]
refine ContinuousAt.comp fc ?_
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : ContinuousAt f z ⊢ ContinuousAt (uncurry fun x => f) ((), z)
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : ContinuousAt f z ⊢ ContinuousAt (fun a => a.2) ((), z)
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : ContinuousAt f z ⊢ ContinuousAt (uncurry fun ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.continuousAt_lift_coe
[538, 1]
[541, 90]
exact continuousAt_snd
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : ContinuousAt f z ⊢ ContinuousAt (fun a => a.2) ((), z)
no goals
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : ContinuousAt f z ⊢ ContinuousAt (fun a => a.2...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.continuous_lift
[550, 1]
[554, 48]
rw [continuous_iff_continuousAt]
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : Continuous f fi : Tendsto f atInf atInf ⊢ Continuous (lift f ∞)
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : Continuous f fi : Tendsto f atInf atInf ⊢ ∀ (x : 𝕊), ContinuousAt (lift f ∞) x
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : Continuous f fi : Tendsto f atInf atInf ⊢ Con...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.continuous_lift
[550, 1]
[554, 48]
intro z
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : Continuous f fi : Tendsto f atInf atInf ⊢ ∀ (x : 𝕊), ContinuousAt (lift f ∞) x
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z✝ : ℂ fc : Continuous f fi : Tendsto f atInf atInf z : 𝕊 ⊢ ContinuousAt (lift f ∞) z
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : Continuous f fi : Tendsto f atInf atInf ⊢ ∀ (...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.continuous_lift
[550, 1]
[554, 48]
induction z using OnePoint.rec
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z✝ : ℂ fc : Continuous f fi : Tendsto f atInf atInf z : 𝕊 ⊢ ContinuousAt (lift f ∞) z
case h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : Continuous f fi : Tendsto f atInf atInf ⊢ ContinuousAt (lift f ∞) ∞ case h₂ X : Type inst✝⁴ : Top...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z✝ : ℂ fc : Continuous f fi : Tendsto f atInf atInf z : ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.continuous_lift
[550, 1]
[554, 48]
exact continuousAt_lift_inf fi
case h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : Continuous f fi : Tendsto f atInf atInf ⊢ ContinuousAt (lift f ∞) ∞
no goals
Please generate a tactic in lean4 to solve the state. STATE: case h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : Continuous f fi : Tendsto f atInf atI...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.continuous_lift
[550, 1]
[554, 48]
exact continuousAt_lift_coe fc.continuousAt
case h₂ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : Continuous f fi : Tendsto f atInf atInf x✝ : ℂ ⊢ ContinuousAt (lift f ∞) ↑x✝
no goals
Please generate a tactic in lean4 to solve the state. STATE: case h₂ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fc : Continuous f fi : Tendsto f atInf atI...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphicAt_lift_coe
[557, 1]
[558, 100]
rw [lift_eq_fill]
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : AnalyticAt ℂ f z ⊢ HolomorphicAt I I (lift f y) ↑z
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : AnalyticAt ℂ f z ⊢ HolomorphicAt I I (fill (fun z => ↑(f z)) y) ↑z
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : AnalyticAt ℂ f z ⊢ HolomorphicAt I I (lift f ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphicAt_lift_coe
[557, 1]
[558, 100]
exact holomorphicAt_fill_coe ((holomorphic_coe _).comp (fa.holomorphicAt I I))
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : AnalyticAt ℂ f z ⊢ HolomorphicAt I I (fill (fun z => ↑(f z)) y) ↑z
no goals
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : AnalyticAt ℂ f z ⊢ HolomorphicAt I I (fill (f...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphicAt_lift_inf
[561, 1]
[565, 32]
rw [lift_eq_fill]
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : ∀ᶠ (z : ℂ) in atInf, AnalyticAt ℂ f z fi : Tendsto f atInf atInf ⊢ HolomorphicAt I I (lift f ∞) ∞
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : ∀ᶠ (z : ℂ) in atInf, AnalyticAt ℂ f z fi : Tendsto f atInf atInf ⊢ HolomorphicAt I I (fill (fun z => ↑(f z...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : ∀ᶠ (z : ℂ) in atInf, AnalyticAt ℂ f z fi : Te...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphicAt_lift_inf
[561, 1]
[565, 32]
apply holomorphicAt_fill_inf
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : ∀ᶠ (z : ℂ) in atInf, AnalyticAt ℂ f z fi : Tendsto f atInf atInf ⊢ HolomorphicAt I I (fill (fun z => ↑(f z...
case fa X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : ∀ᶠ (z : ℂ) in atInf, AnalyticAt ℂ f z fi : Tendsto f atInf atInf ⊢ ∀ᶠ (z : ℂ) in atInf, Holomorphi...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : ∀ᶠ (z : ℂ) in atInf, AnalyticAt ℂ f z fi : Te...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphicAt_lift_inf
[561, 1]
[565, 32]
exact fa.mp (eventually_of_forall fun z fa ↦ (holomorphic_coe _).comp (fa.holomorphicAt I I))
case fa X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : ∀ᶠ (z : ℂ) in atInf, AnalyticAt ℂ f z fi : Tendsto f atInf atInf ⊢ ∀ᶠ (z : ℂ) in atInf, Holomorphi...
case fi X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : ∀ᶠ (z : ℂ) in atInf, AnalyticAt ℂ f z fi : Tendsto f atInf atInf ⊢ Tendsto (fun z => ↑(f z)) atInf...
Please generate a tactic in lean4 to solve the state. STATE: case fa X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : ∀ᶠ (z : ℂ) in atInf, AnalyticAt ℂ f z...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphicAt_lift_inf
[561, 1]
[565, 32]
exact coe_tendsto_inf.comp fi
case fi X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : ∀ᶠ (z : ℂ) in atInf, AnalyticAt ℂ f z fi : Tendsto f atInf atInf ⊢ Tendsto (fun z => ↑(f z)) atInf...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case fi X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : ∀ᶠ (z : ℂ) in atInf, AnalyticAt ℂ f z...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphic_lift
[568, 1]
[572, 53]
intro z
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : AnalyticOn ℂ f univ fi : Tendsto f atInf atInf ⊢ Holomorphic I I (lift f ∞)
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z✝ : ℂ fa : AnalyticOn ℂ f univ fi : Tendsto f atInf atInf z : 𝕊 ⊢ HolomorphicAt I I (lift f ∞) z
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : AnalyticOn ℂ f univ fi : Tendsto f atInf atIn...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphic_lift
[568, 1]
[572, 53]
induction z using OnePoint.rec
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z✝ : ℂ fa : AnalyticOn ℂ f univ fi : Tendsto f atInf atInf z : 𝕊 ⊢ HolomorphicAt I I (lift f ∞) z
case h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : AnalyticOn ℂ f univ fi : Tendsto f atInf atInf ⊢ HolomorphicAt I I (lift f ∞) ∞ case h₂ X : Type ...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z✝ : ℂ fa : AnalyticOn ℂ f univ fi : Tendsto f atInf atI...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphic_lift
[568, 1]
[572, 53]
exact holomorphicAt_lift_inf (eventually_of_forall fun z ↦ fa z (mem_univ _)) fi
case h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : AnalyticOn ℂ f univ fi : Tendsto f atInf atInf ⊢ HolomorphicAt I I (lift f ∞) ∞
no goals
Please generate a tactic in lean4 to solve the state. STATE: case h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : AnalyticOn ℂ f univ fi : Tendsto f at...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphic_lift
[568, 1]
[572, 53]
exact holomorphicAt_lift_coe (fa _ (mem_univ _))
case h₂ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : AnalyticOn ℂ f univ fi : Tendsto f atInf atInf x✝ : ℂ ⊢ HolomorphicAt I I (lift f ∞) ↑x✝
no goals
Please generate a tactic in lean4 to solve the state. STATE: case h₂ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ fa : AnalyticOn ℂ f univ fi : Tendsto f at...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphicLift'
[575, 1]
[585, 69]
apply osgoodManifold (continuous_lift' fa.continuous fi)
X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry f) univ fi : ∀ (x : ℂ), Tendsto (uncurry f) ((𝓝 x).prod atInf) atInf...
case f0 X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry f) univ fi : ∀ (x : ℂ), Tendsto (uncurry f) ((𝓝 x).prod atIn...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry f) univ ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphicLift'
[575, 1]
[585, 69]
intro x z
case f0 X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry f) univ fi : ∀ (x : ℂ), Tendsto (uncurry f) ((𝓝 x).prod atIn...
case f0 X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z✝ : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry f) univ fi : ∀ (x : ℂ), Tendsto (uncurry f) ((𝓝 x).prod at...
Please generate a tactic in lean4 to solve the state. STATE: case f0 X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphicLift'
[575, 1]
[585, 69]
induction z using OnePoint.rec
case f0 X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z✝ : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry f) univ fi : ∀ (x : ℂ), Tendsto (uncurry f) ((𝓝 x).prod at...
case f0.h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry f) univ fi : ∀ (x : ℂ), Tendsto (uncurry f) ((𝓝 x).prod ...
Please generate a tactic in lean4 to solve the state. STATE: case f0 X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z✝ : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurr...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphicLift'
[575, 1]
[585, 69]
simp only [uncurry, lift_inf']
case f0.h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry f) univ fi : ∀ (x : ℂ), Tendsto (uncurry f) ((𝓝 x).prod ...
case f0.h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry f) univ fi : ∀ (x : ℂ), Tendsto (uncurry f) ((𝓝 x).prod ...
Please generate a tactic in lean4 to solve the state. STATE: case f0.h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncu...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphicLift'
[575, 1]
[585, 69]
exact holomorphicAt_const
case f0.h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry f) univ fi : ∀ (x : ℂ), Tendsto (uncurry f) ((𝓝 x).prod ...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case f0.h₁ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncu...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphicLift'
[575, 1]
[585, 69]
exact (holomorphic_coe _).comp ((fa _ (mem_univ ⟨_,_⟩)).along_fst.holomorphicAt _ _)
case f0.h₂ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝¹ : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry f) univ fi : ∀ (x : ℂ), Tendsto (uncurry f) ((𝓝 x).prod...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case f0.h₂ X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝¹ : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (unc...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphicLift'
[575, 1]
[585, 69]
intro x z
case f1 X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry f) univ fi : ∀ (x : ℂ), Tendsto (uncurry f) ((𝓝 x).prod atIn...
case f1 X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z✝ : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry f) univ fi : ∀ (x : ℂ), Tendsto (uncurry f) ((𝓝 x).prod at...
Please generate a tactic in lean4 to solve the state. STATE: case f1 X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x : X z : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/RiemannSphere.lean
RiemannSphere.holomorphicLift'
[575, 1]
[585, 69]
exact holomorphic_lift (fun _ _ ↦ (fa _ (mem_univ ⟨_,_⟩)).along_snd) ((fi x).comp (tendsto_const_nhds.prod_mk Filter.tendsto_id)) z
case f1 X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z✝ : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurry f) univ fi : ∀ (x : ℂ), Tendsto (uncurry f) ((𝓝 x).prod at...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case f1 X : Type inst✝⁴ : TopologicalSpace X Y : Type inst✝³ : TopologicalSpace Y T : Type inst✝² : TopologicalSpace T inst✝¹ : ChartedSpace ℂ T inst✝ : AnalyticManifold I T f✝ : ℂ → ℂ g : X → ℂ → ℂ y : 𝕊 x✝ : X z✝ : ℂ f : ℂ → ℂ → ℂ fa : AnalyticOn ℂ (uncurr...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj
[24, 1]
[35, 61]
rcases complex_inverse_fun' fa nc with ⟨g, ga, gf, fg⟩
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 ⊢ ∀ᶠ (p : S × S) in 𝓝 (z, z), f p.1 = f p.2 → p.1 = p.2
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 ⊢ ∀ᶠ (p : S ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj
[24, 1]
[35, 61]
have n : NontrivialHolomorphicAt g (f z) := by rw [← gf.self_of_nhds] at fa refine (NontrivialHolomorphicAt.anti ?_ fa ga).2 exact (nontrivialHolomorphicAt_id _).congr (Filter.EventuallyEq.symm fg)
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj
[24, 1]
[35, 61]
have o := n.nhds_eq_map_nhds
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj
[24, 1]
[35, 61]
rw [gf.self_of_nhds] at o
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj
[24, 1]
[35, 61]
simp only [nhds_prod_eq, o, Filter.prod_map_map_eq, Filter.eventually_map]
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj
[24, 1]
[35, 61]
refine (fg.prod_mk fg).mp (eventually_of_forall ?_)
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj
[24, 1]
[35, 61]
intro ⟨x, y⟩ ⟨ex, ey⟩ h
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj
[24, 1]
[35, 61]
simp only at ex ey
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj
[24, 1]
[35, 61]
simp only [ex, ey] at h
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj
[24, 1]
[35, 61]
simp only [h]
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj
[24, 1]
[35, 61]
rw [← gf.self_of_nhds] at fa
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (x : S) in 𝓝 z, g (f x)...
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S nc : mfderiv I I f z ≠ 0 g : T → S fa : HolomorphicAt I I f (g (f z)) ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (x : S) in 𝓝 z,...
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S fa : HolomorphicAt I I f z nc : mfderiv I I f z ≠ 0 g : T → S ga...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj
[24, 1]
[35, 61]
refine (NontrivialHolomorphicAt.anti ?_ fa ga).2
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S nc : mfderiv I I f z ≠ 0 g : T → S fa : HolomorphicAt I I f (g (f z)) ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (x : S) in 𝓝 z,...
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S nc : mfderiv I I f z ≠ 0 g : T → S fa : HolomorphicAt I I f (g (f z)) ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (x : S) in 𝓝 z,...
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S nc : mfderiv I I f z ≠ 0 g : T → S fa : HolomorphicAt I I f (g (...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj
[24, 1]
[35, 61]
exact (nontrivialHolomorphicAt_id _).congr (Filter.EventuallyEq.symm fg)
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S nc : mfderiv I I f z ≠ 0 g : T → S fa : HolomorphicAt I I f (g (f z)) ga : HolomorphicAt I I g (f z) gf : ∀ᶠ (x : S) in 𝓝 z,...
no goals
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : S → T z : S nc : mfderiv I I f z ≠ 0 g : T → S fa : HolomorphicAt I I f (g (...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
rcases complex_inverse_fun fa nc with ⟨g, ga, gf, fg⟩
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 ⊢ ∀ᶠ (p : (ℂ × S) × ℂ × S) in 𝓝 ((...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
have n : NontrivialHolomorphicAt (g c) (f c z) := by have e : (c, z) = (c, g c (f c z)) := by rw [gf.self_of_nhds] rw [e] at fa refine (NontrivialHolomorphicAt.anti ?_ fa.along_snd ga.along_snd).2 refine (nontrivialHolomorphicAt_id _).congr ?_ refine ((continuousAt_const.prod continuousAt_id).eventually fg).m...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
have o := n.nhds_eq_map_nhds_param ga
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
rw [gf.self_of_nhds] at o
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
simp only at o
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
rw [nhds_prod_eq, o]
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
simp only [Filter.prod_map_map_eq, Filter.eventually_map]
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
refine (fg.prod_mk fg).mp (eventually_of_forall ?_)
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
intro ⟨x, y⟩ ⟨ex, ey⟩ h1 h2
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
simp only at h1
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
simp only [h1] at ex ey h2 ⊢
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
simp only [ex, ey] at h2
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
simp only [h2]
case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → ...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro.intro S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
have e : (c, z) = (c, g c (f c z)) := by rw [gf.self_of_nhds]
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S ga : HolomorphicAt (I...
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S ga : HolomorphicAt (I...
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
rw [e] at fa
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S ga : HolomorphicAt (I...
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, g c (f c z)) ga : Holomo...
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
refine (NontrivialHolomorphicAt.anti ?_ fa.along_snd ga.along_snd).2
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, g c (f c z)) ga : Holomo...
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, g c (f c z)) ga : Holomo...
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S fa : Holomo...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
refine (nontrivialHolomorphicAt_id _).congr ?_
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, g c (f c z)) ga : Holomo...
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, g c (f c z)) ga : Holomo...
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S fa : Holomo...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
refine ((continuousAt_const.prod continuousAt_id).eventually fg).mp (eventually_of_forall ?_)
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, g c (f c z)) ga : Holomo...
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, g c (f c z)) ga : Holomo...
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S fa : Holomo...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
exact fun _ e ↦ e.symm
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, g c (f c z)) ga : Holomo...
no goals
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S fa : Holomo...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj''
[39, 1]
[54, 90]
rw [gf.self_of_nhds]
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ → T → S ga : HolomorphicAt (I...
no goals
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj'
[58, 1]
[67, 65]
set g : ℂ × S × S → (ℂ × S) × ℂ × S := fun p ↦ ((p.1, p.2.1), (p.1, p.2.2))
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 ⊢ ∀ᶠ (p : ℂ × S × S) in 𝓝 (c, z, z...
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ × S × S → (ℂ × S) × ℂ × S := ...
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj'
[58, 1]
[67, 65]
refine (t.eventually (fa.local_inj'' nc)).mp (eventually_of_forall ?_)
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ × S × S → (ℂ × S) × ℂ × S := ...
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ × S × S → (ℂ × S) × ℂ × S := ...
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj'
[58, 1]
[67, 65]
intro ⟨e, x, y⟩ inj fe
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ × S × S → (ℂ × S) × ℂ × S := ...
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ × S × S → (ℂ × S) × ℂ × S := ...
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj'
[58, 1]
[67, 65]
exact (Prod.ext_iff.mp (inj rfl fe)).2
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ × S × S → (ℂ × S) × ℂ × S := ...
no goals
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj'
[58, 1]
[67, 65]
apply Continuous.continuousAt
S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ × S × S → (ℂ × S) × ℂ × S := ...
case h S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ × S × S → (ℂ × S) × ℂ ...
Please generate a tactic in lean4 to solve the state. STATE: S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj'
[58, 1]
[67, 65]
apply Continuous.prod_mk
case h S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ × S × S → (ℂ × S) × ℂ ...
case h.hf S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ × S × S → (ℂ × S) ×...
Please generate a tactic in lean4 to solve the state. STATE: case h S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c,...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj'
[58, 1]
[67, 65]
exact continuous_fst.prod_mk (continuous_fst.comp continuous_snd)
case h.hf S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ × S × S → (ℂ × S) ×...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case h.hf S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/LocalInj.lean
HolomorphicAt.local_inj'
[58, 1]
[67, 65]
exact continuous_fst.prod_mk (continuous_snd.comp continuous_snd)
case h.hg S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) (c, z) nc : mfderiv I I (f c) z ≠ 0 g : ℂ × S × S → (ℂ × S) ×...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case h.hg S : Type inst✝³ : TopologicalSpace S inst✝² : ChartedSpace ℂ S cms : AnalyticManifold I S T : Type inst✝¹ : TopologicalSpace T inst✝ : ChartedSpace ℂ T cmt : AnalyticManifold I T f : ℂ → S → T c : ℂ z : S fa : HolomorphicAt (I.prod I) I (uncurry f) ...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
nontrivial_local_of_global
[46, 1]
[61, 29]
have fh : HolomorphicOn I I f (closedBall z r) := fun _ m ↦ (fa _ m).holomorphicAt I I
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Topologica...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
nontrivial_local_of_global
[46, 1]
[61, 29]
have zs : z ∈ closedBall z r := mem_closedBall_self rp.le
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Topologica...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
nontrivial_local_of_global
[46, 1]
[61, 29]
use fh _ zs
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Analyti...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Topologica...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
nontrivial_local_of_global
[46, 1]
[61, 29]
contrapose ef
case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Analyti...
case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Analyti...
Please generate a tactic in lean4 to solve the state. STATE: case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
nontrivial_local_of_global
[46, 1]
[61, 29]
simp only [Filter.not_frequently, not_not] at ef
case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Analyti...
case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Analyti...
Please generate a tactic in lean4 to solve the state. STATE: case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
nontrivial_local_of_global
[46, 1]
[61, 29]
simp only [not_forall, not_le]
case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Analyti...
case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Analyti...
Please generate a tactic in lean4 to solve the state. STATE: case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
nontrivial_local_of_global
[46, 1]
[61, 29]
have zrs : z + r ∈ sphere z r := by simp only [mem_sphere, Complex.dist_eq, add_sub_cancel_left, Complex.abs_ofReal, abs_of_pos rp]
case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Analyti...
case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Analyti...
Please generate a tactic in lean4 to solve the state. STATE: case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
nontrivial_local_of_global
[46, 1]
[61, 29]
use z + r, zrs
case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Analyti...
case h X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifo...
Please generate a tactic in lean4 to solve the state. STATE: case nonconst X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
nontrivial_local_of_global
[46, 1]
[61, 29]
simp only [fh.const_of_locally_const' zs (convex_closedBall z r).isPreconnected ef (z + r) (Metric.sphere_subset_closedBall zrs), sub_self, norm_zero, ep]
case h X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifo...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case h X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Top...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
nontrivial_local_of_global
[46, 1]
[61, 29]
simp only [mem_sphere, Complex.dist_eq, add_sub_cancel_left, Complex.abs_ofReal, abs_of_pos rp]
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
no goals
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Topologica...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
have fn : ∀ d, d ∈ u → ∃ᶠ w in 𝓝 z, f d w ≠ f d z := by refine fun d m ↦ (nontrivial_local_of_global (fa.along_snd.mono ?_) rp ep (ef d m)).nonconst simp only [← closedBall_prod_same, mem_prod_eq, setOf_mem_eq, iff_true_iff.mpr m, true_and_iff, subset_refl]
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Topologica...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
have op : ∀ d, d ∈ u → ball (f d z) (e / 2) ⊆ f d '' closedBall z r := by intro d du; refine DiffContOnCl.ball_subset_image_closedBall ?_ rp (ef d du) (fn d du) have e : f d = uncurry f ∘ fun w ↦ (d, w) := rfl rw [e]; apply DifferentiableOn.diffContOnCl; apply AnalyticOn.differentiableOn refine fa.comp (analyti...
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Topologica...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
rcases Metric.continuousAt_iff.mp (fa (c, z) (mk_mem_prod (mem_of_mem_nhds un) (mem_closedBall_self rp.le))).continuousAt (e / 4) (by linarith) with ⟨s, sp, sh⟩
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
case intro.intro X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Anal...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Topologica...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
rw [mem_nhds_prod_iff]
case intro.intro X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Anal...
case intro.intro X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Anal...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type in...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
refine ⟨u ∩ ball c s, Filter.inter_mem un (Metric.ball_mem_nhds c (by linarith)), ?_⟩
case intro.intro X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Anal...
case intro.intro X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Anal...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type in...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
use ball (f c z) (e / 4), Metric.ball_mem_nhds _ (by linarith)
case intro.intro X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : Anal...
case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticMa...
Please generate a tactic in lean4 to solve the state. STATE: case intro.intro X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type in...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
intro ⟨d, w⟩ m
case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticMa...
case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticMa...
Please generate a tactic in lean4 to solve the state. STATE: case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ :...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
simp only [mem_inter_iff, mem_prod_eq, mem_image, @mem_ball _ _ c, lt_min_iff] at m op ⊢
case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticMa...
case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticMa...
Please generate a tactic in lean4 to solve the state. STATE: case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ :...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
have wm : w ∈ ball (f d z) (e / 2) := by simp only [mem_ball] at m ⊢ specialize @sh ⟨d, z⟩; simp only [Prod.dist_eq, dist_self, Function.uncurry] at sh specialize sh (max_lt m.1.2 sp); rw [dist_comm] at sh calc dist w (f d z) _ ≤ dist w (f c z) + dist (f c z) (f d z) := by bound _ < e / 4 + dist (f c z)...
case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticMa...
case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticMa...
Please generate a tactic in lean4 to solve the state. STATE: case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ :...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
specialize op d m.1.1 wm
case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticMa...
case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticMa...
Please generate a tactic in lean4 to solve the state. STATE: case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ :...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
rcases (mem_image _ _ _).mp op with ⟨y, yr, yw⟩
case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticMa...
case right.intro.intro X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu ...
Please generate a tactic in lean4 to solve the state. STATE: case right X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ :...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
use⟨d, y⟩
case right.intro.intro X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu ...
case h X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifo...
Please generate a tactic in lean4 to solve the state. STATE: case right.intro.intro X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : T...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
simp only [mem_prod_eq, Prod.ext_iff, yw, and_true_iff, eq_self_iff_true, true_and_iff, yr, m.1.1]
case h X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifo...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case h X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Top...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
refine fun d m ↦ (nontrivial_local_of_global (fa.along_snd.mono ?_) rp ep (ef d m)).nonconst
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Topologica...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
simp only [← closedBall_prod_same, mem_prod_eq, setOf_mem_eq, iff_true_iff.mpr m, true_and_iff, subset_refl]
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
no goals
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Topologica...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
intro d du
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Topologica...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
refine DiffContOnCl.ball_subset_image_closedBall ?_ rp (ef d du) (fn d du)
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Topologica...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
have e : f d = uncurry f ∘ fun w ↦ (d, w) := rfl
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Topologica...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
rw [e]
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Topologica...
https://github.com/girving/ray.git
0be790285dd0fce78913b0cb9bddaffa94bd25f9
Ray/AnalyticManifold/OpenMapping.lean
AnalyticOn.ball_subset_image_closedBall_param
[65, 1]
[101, 101]
apply DifferentiableOn.diffContOnCl
X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifold 𝓘(ℂ...
case h X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : TopologicalSpace U inst✝ : ChartedSpace ℂ U cmu : AnalyticManifo...
Please generate a tactic in lean4 to solve the state. STATE: X : Type inst✝⁶ : TopologicalSpace X S : Type inst✝⁵ : TopologicalSpace S inst✝⁴ : ChartedSpace ℂ S cms : AnalyticManifold 𝓘(ℂ, ℂ) S T : Type inst✝³ : TopologicalSpace T inst✝² : ChartedSpace ℂ T cmt : AnalyticManifold 𝓘(ℂ, ℂ) T U : Type inst✝¹ : Topologica...