195 lines
4.5 KiB
Plaintext
195 lines
4.5 KiB
Plaintext
import Mathlib.Analysis.Complex.CauchyIntegral
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import Nevanlinna.cauchyRiemann
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variable {E : Type*} [NormedAddCommGroup E] [NormedSpace ℂ E]
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variable {F : Type*} [NormedAddCommGroup F] [NormedSpace ℂ F]
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variable {G : Type*} [NormedAddCommGroup G] [NormedSpace ℂ G]
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def HolomorphicAt (f : E → F) (x : E) : Prop :=
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∃ s ∈ nhds x, ∀ z ∈ s, DifferentiableAt ℂ f z
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theorem HolomorphicAt_iff
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{f : E → F}
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{x : E} :
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HolomorphicAt f x ↔ ∃ s :
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Set E, IsOpen s ∧ x ∈ s ∧ (∀ z ∈ s, DifferentiableAt ℂ f z) := by
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constructor
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· intro hf
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obtain ⟨t, h₁t, h₂t⟩ := hf
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obtain ⟨s, h₁s, h₂s, h₃s⟩ := mem_nhds_iff.1 h₁t
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use s
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constructor
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· assumption
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· constructor
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· assumption
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· intro z hz
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exact h₂t z (h₁s hz)
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· intro hyp
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obtain ⟨s, h₁s, h₂s, hf⟩ := hyp
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use s
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constructor
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· apply (IsOpen.mem_nhds_iff h₁s).2 h₂s
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· assumption
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theorem Differentiable.holomorphicAt
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{f : E → F}
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(hf : Differentiable ℂ f)
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{x : E} :
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HolomorphicAt f x := by
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apply HolomorphicAt_iff.2
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use Set.univ
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constructor
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· exact isOpen_univ
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· constructor
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· exact trivial
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· intro z _
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exact hf z
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theorem HolomorphicAt_isOpen
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(f : E → F) :
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IsOpen { x : E | HolomorphicAt f x } := by
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rw [← subset_interior_iff_isOpen]
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intro x hx
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simp at hx
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obtain ⟨s, h₁s, h₂s, h₃s⟩ := HolomorphicAt_iff.1 hx
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use s
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constructor
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· simp
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constructor
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· exact h₁s
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· intro x hx
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simp
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use s
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constructor
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· exact IsOpen.mem_nhds h₁s hx
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· exact h₃s
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· exact h₂s
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theorem HolomorphicAt_comp
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{g : E → F}
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{f : F → G}
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{z : E}
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(hf : HolomorphicAt f (g z))
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(hg : HolomorphicAt g z) :
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HolomorphicAt (f ∘ g) z := by
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obtain ⟨UE, h₁UE, h₂UE⟩ := hg
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obtain ⟨UF, h₁UF, h₂UF⟩ := hf
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use UE ∩ g⁻¹' UF
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constructor
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· simp
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constructor
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· assumption
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· apply ContinuousAt.preimage_mem_nhds
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apply (h₂UE z (mem_of_mem_nhds h₁UE)).continuousAt
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assumption
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· intro x hx
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apply DifferentiableAt.comp
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apply h₂UF
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exact hx.2
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apply h₂UE
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exact hx.1
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theorem HolomorphicAt_neg
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{f : E → F}
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{z : E}
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(hf : HolomorphicAt f z) :
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HolomorphicAt (-f) z := by
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obtain ⟨UF, h₁UF, h₂UF⟩ := hf
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use UF
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constructor
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· assumption
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· intro z hz
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apply differentiableAt_neg_iff.mp
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simp
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exact h₂UF z hz
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theorem HolomorphicAt.analyticAt
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[CompleteSpace F]
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{f : ℂ → F}
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{x : ℂ} :
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HolomorphicAt f x → AnalyticAt ℂ f x := by
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intro hf
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obtain ⟨s, h₁s, h₂s, h₃s⟩ := HolomorphicAt_iff.1 hf
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apply DifferentiableOn.analyticAt (s := s)
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intro z hz
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apply DifferentiableAt.differentiableWithinAt
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apply h₃s
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exact hz
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exact IsOpen.mem_nhds h₁s h₂s
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theorem AnalyticAt.holomorphicAt
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[CompleteSpace F]
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{f : ℂ → F}
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{x : ℂ} :
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AnalyticAt ℂ f x → HolomorphicAt f x := by
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intro hf
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rw [HolomorphicAt_iff]
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use {x : ℂ | AnalyticAt ℂ f x}
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constructor
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· exact isOpen_analyticAt ℂ f
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· constructor
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· simpa
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· intro z hz
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simp at hz
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exact differentiableAt hz
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theorem HolomorphicAt.contDiffAt
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[CompleteSpace F]
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{f : ℂ → F}
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{z : ℂ}
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{n : ℕ}
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(hf : HolomorphicAt f z) :
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ContDiffAt ℝ n f z := by
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let t := {x | HolomorphicAt f x}
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have ht : IsOpen t := HolomorphicAt_isOpen f
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have hz : z ∈ t := by exact hf
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-- ContDiffAt ℝ _ f z
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apply ContDiffOn.contDiffAt _ ((IsOpen.mem_nhds_iff ht).2 hz)
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suffices h : ContDiffOn ℂ n f t from by
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apply ContDiffOn.restrict_scalars ℝ h
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apply DifferentiableOn.contDiffOn _ ht
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intro w hw
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apply DifferentiableAt.differentiableWithinAt
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-- DifferentiableAt ℂ f w
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let hfw : HolomorphicAt f w := hw
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obtain ⟨s, _, h₂s, h₃s⟩ := HolomorphicAt_iff.1 hfw
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exact h₃s w h₂s
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theorem HolomorphicAt.differentiableAt
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{f : ℂ → F}
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{z : ℂ}
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(hf : HolomorphicAt f z) :
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DifferentiableAt ℂ f z := by
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obtain ⟨s, _, h₂s, h₃s⟩ := HolomorphicAt_iff.1 hf
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exact h₃s z h₂s
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theorem HolomorphicAt.CauchyRiemannAt
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{f : ℂ → F}
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{z : ℂ}
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(h : HolomorphicAt f z) :
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partialDeriv ℝ Complex.I f =ᶠ[nhds z] Complex.I • partialDeriv ℝ 1 f := by
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obtain ⟨s, h₁s, hz, h₂f⟩ := HolomorphicAt_iff.1 h
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apply Filter.eventuallyEq_iff_exists_mem.2
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use s
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constructor
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· exact IsOpen.mem_nhds h₁s hz
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· intro w hw
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let h := h₂f w hw
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unfold partialDeriv
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apply CauchyRiemann₅ h
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