working

2024-08-05 13:41:41 +02:00 · 2024-08-05 13:41:41 +02:00 · c041cff4ad
parent 6759baea2f
commit c041cff4ad
1 changed files with 44 additions and 34 deletions
--- a/Nevanlinna/holomorphic_primitive2.lean
+++ b/Nevanlinna/holomorphic_primitive2.lean
@ -21,7 +21,7 @@ theorem primitive_zeroAtBasepoint
 theorem primitive_fderivAtBasepointZero
  {E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
  (f : ℂ  → E)
-  (hf : Continuous f) :
+  (hf : ContinuousAt f 0) :
  HasDerivAt (primitive 0 f) (f 0) 0 := by
  unfold primitive
  simp
@ -253,8 +253,8 @@ theorem primitive_translation
 theorem primitive_hasDerivAtBasepoint
  {E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
  {f : ℂ  → E}
-  (hf : Continuous f)
-  (z₀ : ℂ) :
+  (z₀ : ℂ)
+  (hf : ContinuousAt f z₀) :
  HasDerivAt (primitive z₀ f) (f z₀) z₀ := by

  let g := f ∘ fun z ↦ z + z₀
@ -545,7 +545,7 @@ theorem primitive_additivity'
  (z₁ : ℂ)
  (hz₁ : z₁ ∈ (Metric.ball z₀ R))
  :
-  ∃ ε : ℝ, ∀ z ∈ (Metric.ball z₁ ε), (primitive z₀ f z) - (primitive z₁ f z) - (primitive z₀ f z₁) = 0 := by
+  primitive z₀ f =ᶠ[nhds z₁] fun z ↦ (primitive z₁ f z) + (primitive z₀ f z₁) := by
  sorry


@ -559,66 +559,76 @@ theorem primitive_hasDerivAt
  HasDerivAt (primitive z₀ f) (f z) z := by

  let A := primitive_additivity' f z₀ R hf z hz
-
-
-
-  rw [primitive_additivity' f hf z₀ z]
+  rw [Filter.EventuallyEq.hasDerivAt_iff A]
  rw [← add_zero (f z)]
  apply HasDerivAt.add
  apply primitive_hasDerivAtBasepoint
-  exact hf.continuous
+
+  apply hf.continuousOn.continuousAt
+  apply (IsOpen.mem_nhds_iff Metric.isOpen_ball).2 hz
  apply hasDerivAt_const


 theorem primitive_differentiable
  {E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
  {f : ℂ  → E}
-  (hf : Differentiable ℂ f)
-  (z₀ : ℂ) :
-  Differentiable ℂ (primitive z₀ f) := by
-  intro z
-  exact (primitive_hasDerivAt hf z₀ z).differentiableAt
+  (z₀ : ℂ)
+  (R : ℝ)
+  (hf : DifferentiableOn ℂ f (Metric.ball z₀ R))
+  :
+  DifferentiableOn ℂ (primitive z₀ f) (Metric.ball z₀ R) := by
+  intro z hz
+  apply DifferentiableAt.differentiableWithinAt
+  exact (primitive_hasDerivAt f z₀ z R hf hz).differentiableAt


 theorem primitive_hasFderivAt
  {E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
  {f : ℂ  → E}
-  (hf : Differentiable ℂ f)
-  (z₀ : ℂ) :
-  ∀ z, HasFDerivAt (primitive z₀ f) ((ContinuousLinearMap.lsmul ℂ ℂ).flip (f z)) z := by
-  intro z
+  (z₀ : ℂ)
+  (R : ℝ)
+  (hf : DifferentiableOn ℂ f (Metric.ball z₀ R))
+  :
+  ∀ z ∈ Metric.ball z₀ R, HasFDerivAt (primitive z₀ f) ((ContinuousLinearMap.lsmul ℂ ℂ).flip (f z)) z := by
+  intro z hz
  rw [hasFDerivAt_iff_hasDerivAt]
  simp
-  exact primitive_hasDerivAt hf z₀ z
+  apply primitive_hasDerivAt f z₀ z R hf hz


 theorem primitive_hasFderivAt'
  {f : ℂ  → ℂ}
-  (hf : Differentiable ℂ f)
-  (z₀ : ℂ) :
-  ∀ z, HasFDerivAt (primitive z₀ f) (ContinuousLinearMap.lsmul ℂ ℂ (f z)) z := by
-  intro z
+  (z₀ : ℂ)
+  (R : ℝ)
+  (hf : DifferentiableOn ℂ f (Metric.ball z₀ R))
+  :
+  ∀ z ∈ Metric.ball z₀ R, HasFDerivAt (primitive z₀ f) (ContinuousLinearMap.lsmul ℂ ℂ (f z)) z := by
+  intro z hz
  rw [hasFDerivAt_iff_hasDerivAt]
  simp
-  exact primitive_hasDerivAt hf z₀ z
+  exact primitive_hasDerivAt f z₀ z R hf hz


 theorem primitive_fderiv
  {E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
  {f : ℂ  → E}
-  (hf : Differentiable ℂ f)
-  (z₀ : ℂ) :
-  ∀ z, (fderiv ℂ (primitive z₀ f) z) = (ContinuousLinearMap.lsmul ℂ ℂ).flip (f z) := by
-  intro z
+  (z₀ : ℂ)
+  (R : ℝ)
+  (hf : DifferentiableOn ℂ f (Metric.ball z₀ R))
+  :
+  ∀ z ∈ Metric.ball z₀ R, (fderiv ℂ (primitive z₀ f) z) = (ContinuousLinearMap.lsmul ℂ ℂ).flip (f z) := by
+  intro z hz
  apply HasFDerivAt.fderiv
-  exact primitive_hasFderivAt hf z₀ z
+  exact primitive_hasFderivAt z₀ R hf z hz


 theorem primitive_fderiv'
  {f : ℂ  → ℂ}
-  (hf : Differentiable ℂ f)
-  (z₀ : ℂ) :
-  ∀ z, (fderiv ℂ (primitive z₀ f) z) = ContinuousLinearMap.lsmul ℂ ℂ (f z) := by
-  intro z
+  (z₀ : ℂ)
+  (R : ℝ)
+  (hf : DifferentiableOn ℂ f (Metric.ball z₀ R))
+  :
+  ∀ z ∈ Metric.ball z₀ R, (fderiv ℂ (primitive z₀ f) z) = ContinuousLinearMap.lsmul ℂ ℂ (f z) := by
+  intro z hz
  apply HasFDerivAt.fderiv
-  exact primitive_hasFderivAt' hf z₀ z
+  exact primitive_hasFderivAt' z₀ R hf z hz