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@ -337,9 +337,59 @@ theorem primitive_additivity
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(R : ℝ)
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(hf : DifferentiableOn ℂ f (Metric.ball z₀ R))
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(z₁ : ℂ)
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(hz₁ : z₁ ∈ Metric.ball z₀ R) :
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∀ z ∈ Metric.ball z₁ (R - ‖z₁‖), (primitive z₀ f z) - (primitive z₁ f z) - (primitive z₀ f z₁) = 0 := by
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intro z _
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(hz₁ : z₁ ∈ Metric.ball z₀ R)
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:
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∀ z ∈ Metric.ball z₁ (R - dist z₁ z₀), (primitive z₀ f z) - (primitive z₁ f z) - (primitive z₀ f z₁) = 0 := by
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intro z hz
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have H : (Set.uIcc z₁.re z.re ×ℂ Set.uIcc z₀.im z₁.im) ⊆ Metric.ball z₀ R := by
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intro x hx
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have a₀ : x.re ∈ Set.uIcc z₁.re z.re := by exact (Complex.mem_reProdIm.1 hx).1
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have a₁ : x.im ∈ Set.uIcc z₀.im z₁.im := by exact (Complex.mem_reProdIm.1 hx).2
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have A₀ : dist x.re z₀.re ≤ dist x.re z₁.re + dist z₁.re z₀.re := by apply dist_triangle
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have A₁ : dist x.im z₀.im ≤ dist z₁.im z₀.im := by
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apply Real.dist_right_le_of_mem_uIcc
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rwa [Set.uIcc_comm]
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have A₂ : dist x.re z₁.re ≤ dist z.re z₁.re := by
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apply Real.dist_right_le_of_mem_uIcc
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rwa [Set.uIcc_comm]
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have A₃ : dist z.re z₁.re < R - dist z₁ z₀ := by
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have : ∀ x₀ x₁ : ℂ, dist x₀.re x₁.re ≤ dist x₀ x₁ := by
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intro x₀ x₁
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rw [Complex.dist_eq_re_im, Real.dist_eq]
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apply Real.le_sqrt_of_sq_le
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simp
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exact sq_nonneg (x₀.im - x₁.im)
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calc dist z.re z₁.re
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_ ≤ dist z z₁ := by apply this z z₁
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_ < R - dist z₁ z₀ := by exact hz
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simp
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have B₀ : dist x z₀ ≤ dist x ⟨z₁.re, x.im⟩ + dist ⟨z₁.re, x.im⟩ z₀ := by apply dist_triangle
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have B₁ : dist ⟨z₁.re, x.im⟩ z₀ ≤ dist z₁ z₀ := by
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rw [Complex.dist_eq_re_im]
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rw [Complex.dist_eq_re_im]
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simp
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apply Real.sqrt_le_sqrt
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simp
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exact sq_le_sq.mpr A₁
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calc dist x z₀
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_ ≤ dist x ⟨z₁.re, x.im⟩ + dist ⟨z₁.re, x.im⟩ z₀ := by apply dist_triangle
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_ = dist x.re z₁.re + dist ⟨z₁.re, x.im⟩ z₀ := by rw [Complex.dist_of_im_eq]; rfl
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_ ≤ dist z.re z₁.re + dist ⟨z₁.re, x.im⟩ z₀ := by apply add_le_add_right A₂
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_ < (R - dist z₁ z₀) + dist ⟨z₁.re, x.im⟩ z₀ := by apply add_lt_add_right A₃
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_ ≤ (R - dist z₁ z₀) + dist z₁ z₀ := by exact (add_le_add_iff_left (R - dist z₁ z₀)).mpr B₁
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_ = R := by exact sub_add_cancel R (dist z₁ z₀)
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unfold primitive
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have : (∫ (x : ℝ) in z₀.re..z.re, f { re := x, im := z₀.im }) = (∫ (x : ℝ) in z₀.re..z₁.re, f { re := x, im := z₀.im }) + (∫ (x : ℝ) in z₁.re..z.re, f { re := x, im := z₀.im }) := by
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@ -365,6 +415,7 @@ theorem primitive_additivity
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simp
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let A₀ : dist x.re z₀.re ≤ dist x.re z₁.re + dist z₁.re z₀.re := by apply dist_triangle
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let A₁ : dist x.im z₀.im ≤ dist z₁.im z₀.im := by sorry
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