Update analyticOn_zeroSet.lean
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@ -380,14 +380,33 @@ theorem AnalyticOnCompact.eliminateZeros
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obtain ⟨g, h₁g, h₂g, h₃g⟩ := AnalyticOn.eliminateZeros (A := A) h₁f n hn
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use g
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use A
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constructor
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· exact h₁g
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· constructor
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· sorry
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· intro z
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have inter : ∀ (z : ℂ), f z = (∏ a ∈ A, (z - ↑a) ^ (h₁f (↑a) a.property).order.toNat) • g z := by
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intro z
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rw [h₃g z]
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congr
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funext a
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congr
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dsimp [n]
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simp [a.2]
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constructor
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· exact h₁g
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· constructor
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· intro z h₁z
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by_cases h₂z : ⟨z, h₁z⟩ ∈ ↑A.toSet
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· exact h₂g ⟨z, h₁z⟩ h₂z
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· have : f z ≠ 0 := by
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by_contra C
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have : ⟨z, h₁z⟩ ∈ ↑A₁ := by
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dsimp [A₁, ι]
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simp
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exact C
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have : ⟨z, h₁z⟩ ∈ ↑A.toSet := by
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dsimp [A]
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simp
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exact this
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tauto
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rw [inter z] at this
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exact right_ne_zero_of_smul this
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· exact inter
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