55 lines
1.3 KiB
Plaintext
55 lines
1.3 KiB
Plaintext
import Mathlib.Analysis.Analytic.Meromorphic
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import Nevanlinna.analyticAt
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import Nevanlinna.divisor
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import Nevanlinna.meromorphicAt
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import Nevanlinna.meromorphicOn_divisor
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import Nevanlinna.stronglyMeromorphicOn
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import Nevanlinna.mathlibAddOn
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open scoped Interval Topology
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open Real Filter MeasureTheory intervalIntegral
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theorem MeromorphicOn.open_of_order_eq_top
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{f : ℂ → ℂ}
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{U : Set ℂ}
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(h₁f : MeromorphicOn f U) :
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IsOpen { u : U | (h₁f u.1 u.2).order = ⊤ } := by
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apply isOpen_iff_forall_mem_open.mpr
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intro z hz
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simp at hz
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rw [MeromorphicAt.order_eq_top_iff] at hz
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rw [eventually_nhdsWithin_iff] at hz
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rw [eventually_nhds_iff] at hz
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obtain ⟨t', h₁t', h₂t', h₃t'⟩ := hz
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let t : Set U := Subtype.val ⁻¹' t'
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use t
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constructor
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· intro w hw
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simp
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sorry
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· constructor
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· exact isOpen_induced h₂t'
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· exact h₃t'
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theorem MeromorphicOn.order_ne_top
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{f : ℂ → ℂ}
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{U : Set ℂ}
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(h₁U : IsConnected U)
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(h₁f : MeromorphicOn f U) :
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(∃ z₀ : U, (h₁f z₀.1 z₀.2).order = ⊤) ↔ (∀ z : U, (h₁f z.1 z.2).order = ⊤) := by
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constructor
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· intro h
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obtain ⟨h₁z₀, h₂z₀⟩ := h
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intro hz
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sorry
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· intro h
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obtain ⟨w, hw⟩ := h₁U.nonempty
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use ⟨w, hw⟩
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exact h ⟨w, hw⟩
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