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1 changed files with 20 additions and 46 deletions

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@ -126,22 +126,6 @@ theorem logabs_of_holomorphic_is_harmonic
have f_is_real_C2 : ContDiff 2 f :=
ContDiff.restrict_scalars (Differentiable.contDiff h₁)
-- Complex.log ∘ f is real C²
have t₀ : Differentiable (Complex.log ∘ f) := by
intro z
apply DifferentiableAt.comp
exact Complex.differentiableAt_log (h₃ z)
exact h₁ z
have t₂ : Complex.log ∘ ⇑(starRingEnd ) ∘ f = ⇑(starRingEnd ) ∘ Complex.log ∘ f := by
funext z
unfold Function.comp
rw [Complex.log_conj]
exact Complex.slitPlane_arg_ne_pi (h₃ z)
have t₃ : ⇑(starRingEnd ) ∘ Complex.log ∘ f = Complex.conjCLE ∘ Complex.log ∘ f := by
rfl
-- The norm square is z * z.conj
have normSq_conj : ∀ (z : ), (starRingEnd ) z * z = ↑‖z‖ ^ 2 := Complex.conj_mul'
@ -161,16 +145,6 @@ theorem logabs_of_holomorphic_is_harmonic
apply ContinuousLinearMap.contDiff Complex.imCLM
apply ContinuousLinearMap.contDiff Complex.imCLM
have t₄ : ContDiff 2 (Real.log ∘ ⇑Complex.normSq ∘ f) := by
rw [contDiff_iff_contDiffAt]
intro z
apply ContDiffAt.comp
apply Real.contDiffAt_log.mpr
simp
exact h₂ z
apply ContDiff.comp_contDiffAt z normSq_is_real_C2
exact ContDiff.contDiffAt f_is_real_C2
constructor
· -- logabs f is real C²
have : (fun z ↦ Real.log ‖f z‖) = (2 : )⁻¹ • (Real.log ∘ Complex.normSq ∘ f) := by
@ -217,8 +191,7 @@ theorem logabs_of_holomorphic_is_harmonic
intro z
rw [laplace_compContLin]
simp
-- ContDiff 2 (Real.log ∘ ⇑Complex.normSq ∘ f)
exact t₄
sorry
conv =>
intro z
rw [this z]
@ -258,31 +231,32 @@ theorem logabs_of_holomorphic_is_harmonic
rw [this]
rw [laplace_add]
have : Differentiable (Complex.log ∘ f) := by
intro z
apply DifferentiableAt.comp
exact Complex.differentiableAt_log (h₃ z)
exact h₁ z
have t₁: Complex.laplace (Complex.log ∘ f) = 0 := by
let A := holomorphic_is_harmonic t₀
let A := holomorphic_is_harmonic this
funext z
exact A.2 z
rw [t₁]
simp
rw [t₂]
have : Complex.log ∘ ⇑(starRingEnd ) ∘ f = ⇑(starRingEnd ) ∘ Complex.log ∘ f := by
funext z
unfold Function.comp
rw [Complex.log_conj]
exact Complex.slitPlane_arg_ne_pi (h₃ z)
rw [this]
rw [t₃]
have : ⇑(starRingEnd ) ∘ Complex.log ∘ f = Complex.conjCLE ∘ Complex.log ∘ f := by
rfl
rw [this]
rw [laplace_compCLE]
rw [t₁]
simp
-- ContDiff 2 (Complex.log ∘ f)
exact ContDiff.restrict_scalars (Differentiable.contDiff t₀)
-- ContDiff 2 (Complex.log ∘ ⇑(starRingEnd ) ∘ f)
rw [t₂, t₃]
apply ContDiff.comp
exact ContinuousLinearEquiv.contDiff Complex.conjCLE
exact ContDiff.restrict_scalars (Differentiable.contDiff t₀)
-- ContDiff 2 (Complex.log ∘ f)
exact ContDiff.restrict_scalars (Differentiable.contDiff t₀)
-- ContDiff 2 (Real.log ∘ ⇑Complex.normSq ∘ f)
exact t₄
sorry
sorry
sorry