847 lines
26 KiB
Plaintext
847 lines
26 KiB
Plaintext
import Mathlib.Analysis.Complex.TaylorSeries
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import Mathlib.Data.ENNReal.Basic
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noncomputable def primitive
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{E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E] :
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ℂ → (ℂ → E) → (ℂ → E) := by
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intro z₀
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intro f
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exact fun z ↦ (∫ (x : ℝ) in z₀.re..z.re, f ⟨x, z₀.im⟩) + Complex.I • ∫ (x : ℝ) in z₀.im..z.im, f ⟨z.re, x⟩
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theorem primitive_zeroAtBasepoint
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{E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
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(f : ℂ → E)
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(z₀ : ℂ) :
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(primitive z₀ f) z₀ = 0 := by
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unfold primitive
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simp
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theorem primitive_fderivAtBasepointZero
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{E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
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{f : ℂ → E}
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{R : ℝ}
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(hR : 0 < R)
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(hf : ContinuousOn f (Metric.ball 0 R)) :
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HasDerivAt (primitive 0 f) (f 0) 0 := by
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unfold primitive
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simp
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apply hasDerivAt_iff_isLittleO.2
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simp
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rw [Asymptotics.isLittleO_iff]
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intro c hc
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have {z : ℂ} {e : E} : z • e = (∫ (_ : ℝ) in (0)..(z.re), e) + Complex.I • ∫ (_ : ℝ) in (0)..(z.im), e:= by
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simp
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rw [smul_comm]
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rw [← smul_assoc]
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simp
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have : z.re • e = (z.re : ℂ) • e := by exact rfl
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rw [this, ← add_smul]
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simp
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conv =>
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left
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intro x
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left
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arg 1
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arg 2
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rw [this]
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obtain ⟨s, h₁s, h₂s⟩ : ∃ s ⊆ f⁻¹' Metric.ball (f 0) (c / (4 : ℝ)), IsOpen s ∧ 0 ∈ s := by
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apply eventually_nhds_iff.mp
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apply continuousAt_def.1
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apply Continuous.continuousAt
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fun_prop
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apply continuousAt_def.1
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apply hf.continuousAt
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exact Metric.ball_mem_nhds 0 hR
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apply Metric.ball_mem_nhds (f 0)
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simpa
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obtain ⟨ε, h₁ε, h₂ε⟩ : ∃ ε > 0, (Metric.ball 0 ε) ×ℂ (Metric.ball 0 ε) ⊆ s ∧ (Metric.ball 0 ε) ×ℂ (Metric.ball 0 ε) ⊆ Metric.ball 0 R := by
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obtain ⟨ε', h₁ε', h₂ε'⟩ : ∃ ε' > 0, Metric.ball 0 ε' ⊆ s ∩ Metric.ball 0 R := by
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apply Metric.mem_nhds_iff.mp
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apply IsOpen.mem_nhds
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apply IsOpen.inter
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exact h₂s.1
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exact Metric.isOpen_ball
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constructor
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· exact h₂s.2
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· simpa
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use (2 : ℝ)⁻¹ * ε'
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constructor
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· simpa
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· constructor
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· intro x hx
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apply (h₂ε' _).1
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simp
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calc Complex.abs x
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_ ≤ |x.re| + |x.im| := Complex.abs_le_abs_re_add_abs_im x
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_ < (2 : ℝ)⁻¹ * ε' + |x.im| := by
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apply (add_lt_add_iff_right |x.im|).mpr
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have : x.re ∈ Metric.ball 0 (2⁻¹ * ε') := (Complex.mem_reProdIm.1 hx).1
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simp at this
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exact this
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_ < (2 : ℝ)⁻¹ * ε' + (2 : ℝ)⁻¹ * ε' := by
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apply (add_lt_add_iff_left ((2 : ℝ)⁻¹ * ε')).mpr
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have : x.im ∈ Metric.ball 0 (2⁻¹ * ε') := (Complex.mem_reProdIm.1 hx).2
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simp at this
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exact this
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_ = ε' := by
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rw [← add_mul]
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abel_nf
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simp
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· intro x hx
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apply (h₂ε' _).2
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simp
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calc Complex.abs x
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_ ≤ |x.re| + |x.im| := Complex.abs_le_abs_re_add_abs_im x
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_ < (2 : ℝ)⁻¹ * ε' + |x.im| := by
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apply (add_lt_add_iff_right |x.im|).mpr
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have : x.re ∈ Metric.ball 0 (2⁻¹ * ε') := (Complex.mem_reProdIm.1 hx).1
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simp at this
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exact this
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_ < (2 : ℝ)⁻¹ * ε' + (2 : ℝ)⁻¹ * ε' := by
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apply (add_lt_add_iff_left ((2 : ℝ)⁻¹ * ε')).mpr
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have : x.im ∈ Metric.ball 0 (2⁻¹ * ε') := (Complex.mem_reProdIm.1 hx).2
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simp at this
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exact this
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_ = ε' := by
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rw [← add_mul]
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abel_nf
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simp
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have h₃ε : ∀ y ∈ (Metric.ball 0 ε) ×ℂ (Metric.ball 0 ε), ‖(f y) - (f 0)‖ < (c / (4 : ℝ)) := by
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intro y hy
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apply mem_ball_iff_norm.mp
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apply h₁s
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exact h₂ε.1 hy
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have intervalComputation_uIcc {x' y' : ℝ} (h : x' ∈ Set.uIcc 0 y') : |x'| ≤ |y'| := by
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let A := h.1
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let B := h.2
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rcases le_total 0 y' with hy | hy
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· simp [hy] at A
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simp [hy] at B
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rwa [abs_of_nonneg A, abs_of_nonneg hy]
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· simp [hy] at A
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simp [hy] at B
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rw [abs_of_nonpos hy]
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rw [abs_of_nonpos]
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linarith [h.1]
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exact B
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rw [Filter.eventually_iff_exists_mem]
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use Metric.ball 0 (ε / (4 : ℝ))
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constructor
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· apply Metric.ball_mem_nhds 0
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linarith
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· intro y hy
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have {A B C D :E} : (A + B) - (C + D) = (A - C) + (B - D) := by
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abel
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rw [this]
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rw [← smul_sub]
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have t₀ : IntervalIntegrable (fun x => f { re := x, im := 0 }) MeasureTheory.volume 0 y.re := by
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apply ContinuousOn.intervalIntegrable
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apply ContinuousOn.comp
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exact hf
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have : (fun x => ({ re := x, im := 0 } : ℂ)) = Complex.ofRealLI := by rfl
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rw [this]
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apply Continuous.continuousOn
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continuity
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intro x hx
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apply h₂ε.2
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simp
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constructor
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· simp
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calc |x|
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_ ≤ |y.re| := by apply intervalComputation_uIcc hx
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_ ≤ Complex.abs y := by exact Complex.abs_re_le_abs y
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_ < ε / 4 := by simp at hy; assumption
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_ < ε := by linarith
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· simpa
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have t₁ : IntervalIntegrable (fun _ => f 0) MeasureTheory.volume 0 y.re := by
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apply ContinuousOn.intervalIntegrable
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apply ContinuousOn.comp
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apply hf
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fun_prop
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intro x _
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simpa
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rw [← intervalIntegral.integral_sub t₀ t₁]
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have t₂ : IntervalIntegrable (fun x_1 => f { re := y.re, im := x_1 }) MeasureTheory.volume 0 y.im := by
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apply ContinuousOn.intervalIntegrable
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apply ContinuousOn.comp
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exact hf
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have : (Complex.mk y.re) = (fun x => Complex.I • Complex.ofRealCLM x + { re := y.re, im := 0 }) := by
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funext x
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apply Complex.ext
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rw [Complex.add_re]
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simp
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simp
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rw [this]
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apply ContinuousOn.add
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apply Continuous.continuousOn
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continuity
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fun_prop
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intro x hx
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apply h₂ε.2
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constructor
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· simp
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calc |y.re|
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_ ≤ Complex.abs y := by exact Complex.abs_re_le_abs y
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_ < ε / 4 := by simp at hy; assumption
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_ < ε := by linarith
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· simp
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calc |x|
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_ ≤ |y.im| := by apply intervalComputation_uIcc hx
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_ ≤ Complex.abs y := by exact Complex.abs_im_le_abs y
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_ < ε / 4 := by simp at hy; assumption
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_ < ε := by linarith
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have t₃ : IntervalIntegrable (fun _ => f 0) MeasureTheory.volume 0 y.im := by
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apply ContinuousOn.intervalIntegrable
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apply ContinuousOn.comp
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exact hf
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fun_prop
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intro x _
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apply h₂ε.2
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simp
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constructor
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· simpa
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· simpa
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rw [← intervalIntegral.integral_sub t₂ t₃]
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have h₁y : |y.re| < ε / 4 := by
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calc |y.re|
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_ ≤ Complex.abs y := by apply Complex.abs_re_le_abs
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_ < ε / 4 := by
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let A := mem_ball_iff_norm.1 hy
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simp at A
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linarith
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have h₂y : |y.im| < ε / 4 := by
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calc |y.im|
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_ ≤ Complex.abs y := by apply Complex.abs_im_le_abs
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_ < ε / 4 := by
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let A := mem_ball_iff_norm.1 hy
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simp at A
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linarith
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have intervalComputation {x' y' : ℝ} (h : x' ∈ Ι 0 y') : |x'| ≤ |y'| := by
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let A := h.1
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let B := h.2
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rcases le_total 0 y' with hy | hy
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· simp [hy] at A
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simp [hy] at B
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rw [abs_of_nonneg hy]
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rw [abs_of_nonneg (le_of_lt A)]
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exact B
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· simp [hy] at A
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simp [hy] at B
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rw [abs_of_nonpos hy]
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rw [abs_of_nonpos]
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linarith [h.1]
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exact B
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have t₁ : ‖(∫ (x : ℝ) in (0)..(y.re), f { re := x, im := 0 } - f 0)‖ ≤ (c / (4 : ℝ)) * |y.re - 0| := by
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apply intervalIntegral.norm_integral_le_of_norm_le_const
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intro x hx
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have h₁x : |x| < ε / 4 := by
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calc |x|
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_ ≤ |y.re| := intervalComputation hx
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_ < ε / 4 := h₁y
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apply le_of_lt
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apply h₃ε { re := x, im := 0 }
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constructor
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· simp
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linarith
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· simp
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exact h₁ε
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have t₂ : ‖∫ (x : ℝ) in (0)..(y.im), f { re := y.re, im := x } - f 0‖ ≤ (c / (4 : ℝ)) * |y.im - 0| := by
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apply intervalIntegral.norm_integral_le_of_norm_le_const
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intro x hx
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have h₁x : |x| < ε / 4 := by
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calc |x|
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_ ≤ |y.im| := intervalComputation hx
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_ < ε / 4 := h₂y
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apply le_of_lt
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apply h₃ε { re := y.re, im := x }
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constructor
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· simp
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linarith
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· simp
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linarith
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calc ‖(∫ (x : ℝ) in (0)..(y.re), f { re := x, im := 0 } - f 0) + Complex.I • ∫ (x : ℝ) in (0)..(y.im), f { re := y.re, im := x } - f 0‖
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_ ≤ ‖(∫ (x : ℝ) in (0)..(y.re), f { re := x, im := 0 } - f 0)‖ + ‖Complex.I • ∫ (x : ℝ) in (0)..(y.im), f { re := y.re, im := x } - f 0‖ := by
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apply norm_add_le
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_ ≤ ‖(∫ (x : ℝ) in (0)..(y.re), f { re := x, im := 0 } - f 0)‖ + ‖∫ (x : ℝ) in (0)..(y.im), f { re := y.re, im := x } - f 0‖ := by
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simp
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rw [norm_smul]
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simp
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_ ≤ (c / (4 : ℝ)) * |y.re - 0| + (c / (4 : ℝ)) * |y.im - 0| := by
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apply add_le_add
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exact t₁
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exact t₂
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_ ≤ (c / (4 : ℝ)) * (|y.re| + |y.im|) := by
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simp
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rw [mul_add]
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_ ≤ (c / (4 : ℝ)) * (4 * ‖y‖) := by
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have : |y.re| + |y.im| ≤ 4 * ‖y‖ := by
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calc |y.re| + |y.im|
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_ ≤ ‖y‖ + ‖y‖ := by
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apply add_le_add
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apply Complex.abs_re_le_abs
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apply Complex.abs_im_le_abs
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_ ≤ 4 * ‖y‖ := by
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rw [← two_mul]
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apply mul_le_mul
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linarith
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rfl
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exact norm_nonneg y
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linarith
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apply mul_le_mul
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rfl
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exact this
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apply add_nonneg
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apply abs_nonneg
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apply abs_nonneg
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linarith
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_ ≤ c * ‖y‖ := by
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linarith
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theorem primitive_translation
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{E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
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(f : ℂ → E)
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(z₀ t : ℂ) :
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primitive z₀ (f ∘ fun z ↦ (z - t)) = ((primitive (z₀ - t) f) ∘ fun z ↦ (z - t)) := by
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funext z
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unfold primitive
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simp
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let g : ℝ → E := fun x ↦ f ( {re := x, im := z₀.im - t.im} )
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have {x : ℝ} : f ({ re := x, im := z₀.im } - t) = g (1*x - t.re) := by
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congr 1
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apply Complex.ext <;> simp
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conv =>
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left
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left
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arg 1
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intro x
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rw [this]
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rw [intervalIntegral.integral_comp_mul_sub g one_ne_zero (t.re)]
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simp
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congr 1
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let g : ℝ → E := fun x ↦ f ( {re := z.re - t.re, im := x} )
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have {x : ℝ} : f ({ re := z.re, im := x} - t) = g (1*x - t.im) := by
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congr 1
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apply Complex.ext <;> simp
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conv =>
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left
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arg 1
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intro x
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rw [this]
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rw [intervalIntegral.integral_comp_mul_sub g one_ne_zero (t.im)]
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simp
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theorem primitive_hasDerivAtBasepoint
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{E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
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{f : ℂ → E}
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{R : ℝ}
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(z₀ : ℂ)
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(hR : 0 < R)
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(hf : ContinuousOn f (Metric.ball z₀ R)) :
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HasDerivAt (primitive z₀ f) (f z₀) z₀ := by
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let g := f ∘ fun z ↦ z + z₀
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have hg : ContinuousOn g (Metric.ball 0 R) := by
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apply ContinuousOn.comp
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fun_prop
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fun_prop
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intro x hx
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simp
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simp at hx
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assumption
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let B := primitive_translation g z₀ z₀
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simp at B
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have : (g ∘ fun z ↦ (z - z₀)) = f := by
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funext z
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dsimp [g]
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simp
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rw [this] at B
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rw [B]
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have : f z₀ = (1 : ℂ) • (f z₀) := (MulAction.one_smul (f z₀)).symm
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conv =>
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arg 2
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rw [this]
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apply HasDerivAt.scomp
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simp
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have : g 0 = f z₀ := by simp [g]
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rw [← this]
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exact primitive_fderivAtBasepointZero hR hg
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apply HasDerivAt.sub_const
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have : (fun (x : ℂ) ↦ x) = id := by
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funext x
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simp
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rw [this]
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exact hasDerivAt_id z₀
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theorem primitive_additivity
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{E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
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{f : ℂ → E}
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{z₀ : ℂ}
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{rx ry : ℝ}
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(hf : DifferentiableOn ℂ f (Metric.ball z₀.re rx ×ℂ Metric.ball z₀.im ry))
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(hry : 0 < ry)
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{z₁ : ℂ}
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(hz₁ : z₁ ∈ (Metric.ball z₀.re rx ×ℂ Metric.ball z₀.im ry))
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:
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∃ εx > 0, ∃ εy > 0, ∀ z ∈ (Metric.ball z₁.re εx ×ℂ Metric.ball z₁.im εy), (primitive z₀ f z) - (primitive z₁ f z) - (primitive z₀ f z₁) = 0 := by
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let εx := rx - dist z₀.re z₁.re
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have hεx : εx > 0 := by
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let A := hz₁.1
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simp at A
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dsimp [εx]
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rw [dist_comm]
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simpa
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let εy := ry - dist z₀.im z₁.im
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have hεy : εy > 0 := by
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let A := hz₁.2
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simp at A
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dsimp [εy]
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rw [dist_comm]
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simpa
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use εx
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use hεx
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use εy
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use hεy
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intro z hz
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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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rw [intervalIntegral.integral_add_adjacent_intervals]
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-- IntervalIntegrable (fun x => f { re := x, im := z₀.im }) MeasureTheory.volume z₀.re z₁.re
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apply ContinuousOn.intervalIntegrable
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apply ContinuousOn.comp
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exact hf.continuousOn
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have {b : ℝ} : ((fun x => { re := x, im := b }) : ℝ → ℂ) = (fun x => Complex.ofRealCLM x + { re := 0, im := b }) := by
|
||
funext x
|
||
apply Complex.ext
|
||
rw [Complex.add_re]
|
||
simp
|
||
rw [Complex.add_im]
|
||
simp
|
||
apply Continuous.continuousOn
|
||
rw [this]
|
||
continuity
|
||
-- Remains: Set.MapsTo (fun x => { re := x, im := z₀.im }) (Set.uIcc z₀.re z₁.re) (Metric.ball z₀.re rx ×ℂ Metric.ball z₀.im ry)
|
||
intro w hw
|
||
simp
|
||
apply Complex.mem_reProdIm.mpr
|
||
constructor
|
||
· simp
|
||
calc dist w z₀.re
|
||
_ ≤ dist z₁.re z₀.re := by apply Real.dist_right_le_of_mem_uIcc; rwa [Set.uIcc_comm] at hw
|
||
_ < rx := by apply Metric.mem_ball.mp (Complex.mem_reProdIm.1 hz₁).1
|
||
· simpa
|
||
|
||
-- IntervalIntegrable (fun x => f { re := x, im := z₀.im }) MeasureTheory.volume z₁.re z.re
|
||
apply ContinuousOn.intervalIntegrable
|
||
apply ContinuousOn.comp
|
||
exact hf.continuousOn
|
||
have {b : ℝ} : ((fun x => { re := x, im := b }) : ℝ → ℂ) = (fun x => Complex.ofRealCLM x + { re := 0, im := b }) := by
|
||
funext x
|
||
apply Complex.ext
|
||
rw [Complex.add_re]
|
||
simp
|
||
rw [Complex.add_im]
|
||
simp
|
||
apply Continuous.continuousOn
|
||
rw [this]
|
||
continuity
|
||
-- Remains: Set.MapsTo (fun x => { re := x, im := z₀.im }) (Set.uIcc z₁.re z.re) (Metric.ball z₀.re rx ×ℂ Metric.ball z₀.im ry)
|
||
intro w hw
|
||
simp
|
||
constructor
|
||
· simp
|
||
calc dist w z₀.re
|
||
_ ≤ dist w z₁.re + dist z₁.re z₀.re := by exact dist_triangle w z₁.re z₀.re
|
||
_ ≤ dist z.re z₁.re + dist z₁.re z₀.re := by
|
||
apply (add_le_add_iff_right (dist z₁.re z₀.re)).mpr
|
||
rw [Set.uIcc_comm] at hw
|
||
exact Real.dist_right_le_of_mem_uIcc hw
|
||
_ < (rx - dist z₀.re z₁.re) + dist z₁.re z₀.re := by
|
||
apply (add_lt_add_iff_right (dist z₁.re z₀.re)).mpr
|
||
apply Metric.mem_ball.1 (Complex.mem_reProdIm.1 hz).1
|
||
_ = rx := by
|
||
rw [dist_comm]
|
||
simp
|
||
· simpa
|
||
rw [this]
|
||
|
||
have : (∫ (x : ℝ) in z₀.im..z.im, f { re := z.re, im := x }) = (∫ (x : ℝ) in z₀.im..z₁.im, f { re := z.re, im := x }) + (∫ (x : ℝ) in z₁.im..z.im, f { re := z.re, im := x }) := by
|
||
rw [intervalIntegral.integral_add_adjacent_intervals]
|
||
|
||
-- IntervalIntegrable (fun x => f { re := z.re, im := x }) MeasureTheory.volume z₀.im z₁.im
|
||
apply ContinuousOn.intervalIntegrable
|
||
apply ContinuousOn.comp
|
||
exact hf.continuousOn
|
||
apply Continuous.continuousOn
|
||
have {b : ℝ}: (Complex.mk b) = (fun x => Complex.I • Complex.ofRealCLM x + { re := b, im := 0 }) := by
|
||
funext x
|
||
apply Complex.ext
|
||
rw [Complex.add_re]
|
||
simp
|
||
simp
|
||
rw [this]
|
||
apply Continuous.add
|
||
fun_prop
|
||
fun_prop
|
||
-- Set.MapsTo (Complex.mk z.re) (Set.uIcc z₀.im z₁.im) (Metric.ball z₀.re rx ×ℂ Metric.ball z₀.im ry)
|
||
intro w hw
|
||
constructor
|
||
· simp
|
||
calc dist z.re z₀.re
|
||
_ ≤ dist z.re z₁.re + dist z₁.re z₀.re := by exact dist_triangle z.re z₁.re z₀.re
|
||
_ < (rx - dist z₀.re z₁.re) + dist z₁.re z₀.re := by
|
||
apply (add_lt_add_iff_right (dist z₁.re z₀.re)).mpr
|
||
apply Metric.mem_ball.1 (Complex.mem_reProdIm.1 hz).1
|
||
_ = rx := by
|
||
rw [dist_comm]
|
||
simp
|
||
· simp
|
||
calc dist w z₀.im
|
||
_ ≤ dist z₁.im z₀.im := by rw [Set.uIcc_comm] at hw; exact Real.dist_right_le_of_mem_uIcc hw
|
||
_ < ry := by
|
||
rw [← Metric.mem_ball]
|
||
exact hz₁.2
|
||
|
||
-- IntervalIntegrable (fun x => f { re := z.re, im := x }) MeasureTheory.volume z₁.im z.im
|
||
apply ContinuousOn.intervalIntegrable
|
||
apply ContinuousOn.comp
|
||
exact hf.continuousOn
|
||
apply Continuous.continuousOn
|
||
have {b : ℝ}: (Complex.mk b) = (fun x => Complex.I • Complex.ofRealCLM x + { re := b, im := 0 }) := by
|
||
funext x
|
||
apply Complex.ext
|
||
rw [Complex.add_re]
|
||
simp
|
||
simp
|
||
rw [this]
|
||
apply Continuous.add
|
||
fun_prop
|
||
fun_prop
|
||
-- Set.MapsTo (Complex.mk z.re) (Set.uIcc z₁.im z.im) (Metric.ball z₀.re rx ×ℂ Metric.ball z₀.im ry)
|
||
intro w hw
|
||
constructor
|
||
· simp
|
||
calc dist z.re z₀.re
|
||
_ ≤ dist z.re z₁.re + dist z₁.re z₀.re := by exact dist_triangle z.re z₁.re z₀.re
|
||
_ < (rx - dist z₀.re z₁.re) + dist z₁.re z₀.re := by
|
||
apply (add_lt_add_iff_right (dist z₁.re z₀.re)).mpr
|
||
apply Metric.mem_ball.1 (Complex.mem_reProdIm.1 hz).1
|
||
_ = rx := by
|
||
rw [dist_comm]
|
||
simp
|
||
· simp
|
||
calc dist w z₀.im
|
||
_ ≤ dist w z₁.im + dist z₁.im z₀.im := by exact dist_triangle w z₁.im z₀.im
|
||
_ ≤ dist z.im z₁.im + dist z₁.im z₀.im := by
|
||
apply (add_le_add_iff_right (dist z₁.im z₀.im)).mpr
|
||
rw [Set.uIcc_comm] at hw
|
||
exact Real.dist_right_le_of_mem_uIcc hw
|
||
_ < (ry - dist z₀.im z₁.im) + dist z₁.im z₀.im := by
|
||
apply (add_lt_add_iff_right (dist z₁.im z₀.im)).mpr
|
||
apply Metric.mem_ball.1 (Complex.mem_reProdIm.1 hz).2
|
||
_ = ry := by
|
||
rw [dist_comm]
|
||
simp
|
||
rw [this]
|
||
|
||
simp
|
||
|
||
have {a b c d e f g h : E} : (a + b) + (c + d) - (e + f) - (g + h) = b + (a - g) - e - f + d - h + (c) := by
|
||
abel
|
||
rw [this]
|
||
|
||
|
||
have H' : DifferentiableOn ℂ f (Set.uIcc z₁.re z.re ×ℂ Set.uIcc z₀.im z₁.im) := by
|
||
apply DifferentiableOn.mono hf
|
||
intro x hx
|
||
constructor
|
||
· simp
|
||
calc dist x.re z₀.re
|
||
_ ≤ dist x.re z₁.re + dist z₁.re z₀.re := by exact dist_triangle x.re z₁.re z₀.re
|
||
_ ≤ dist z.re z₁.re + dist z₁.re z₀.re := by
|
||
apply (add_le_add_iff_right (dist z₁.re z₀.re)).mpr
|
||
rw [Set.uIcc_comm] at hx
|
||
apply Real.dist_right_le_of_mem_uIcc (Complex.mem_reProdIm.1 hx).1
|
||
_ < (rx - dist z₀.re z₁.re) + dist z₁.re z₀.re := by
|
||
apply (add_lt_add_iff_right (dist z₁.re z₀.re)).mpr
|
||
apply Metric.mem_ball.1 (Complex.mem_reProdIm.1 hz).1
|
||
_ = rx := by
|
||
rw [dist_comm]
|
||
simp
|
||
· simp
|
||
calc dist x.im z₀.im
|
||
_ ≤ dist z₀.im z₁.im := by rw [dist_comm]; exact Real.dist_left_le_of_mem_uIcc (Complex.mem_reProdIm.1 hx).2
|
||
_ < ry := by
|
||
rw [dist_comm]
|
||
exact Metric.mem_ball.1 (Complex.mem_reProdIm.1 hz₁).2
|
||
|
||
let A := Complex.integral_boundary_rect_eq_zero_of_differentiableOn f ⟨z₁.re, z₀.im⟩ ⟨z.re, z₁.im⟩ H'
|
||
have {x : ℝ} {w : ℂ} : ↑x + w.im * Complex.I = { re := x, im := w.im } := by
|
||
apply Complex.ext
|
||
· simp
|
||
· simp
|
||
simp_rw [this] at A
|
||
have {x : ℝ} {w : ℂ} : w.re + x * Complex.I = { re := w.re, im := x } := by
|
||
apply Complex.ext
|
||
· simp
|
||
· simp
|
||
simp_rw [this] at A
|
||
rw [← A]
|
||
abel
|
||
|
||
|
||
theorem primitive_additivity'
|
||
{E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
|
||
{f : ℂ → E}
|
||
{z₀ z₁ : ℂ}
|
||
{R : ℝ}
|
||
(hf : DifferentiableOn ℂ f (Metric.ball z₀ R))
|
||
(hz₁ : z₁ ∈ Metric.ball z₀ R)
|
||
:
|
||
primitive z₀ f =ᶠ[nhds z₁] fun z ↦ (primitive z₁ f z) + (primitive z₀ f z₁) := by
|
||
|
||
let d := fun ε ↦ √((dist z₁.re z₀.re + ε) ^ 2 + (dist z₁.im z₀.im + ε) ^ 2)
|
||
have h₀d : Continuous d := by continuity
|
||
have h₁d : ∀ ε, 0 ≤ d ε := fun ε ↦ Real.sqrt_nonneg ((dist z₁.re z₀.re + ε) ^ 2 + (dist z₁.im z₀.im + ε) ^ 2)
|
||
|
||
obtain ⟨ε, h₀ε, h₁ε⟩ : ∃ ε > 0, d ε < R := by
|
||
let Omega := d⁻¹' Metric.ball 0 R
|
||
|
||
have lem₀Ω : IsOpen Omega := IsOpen.preimage h₀d Metric.isOpen_ball
|
||
have lem₁Ω : 0 ∈ Omega := by
|
||
dsimp [Omega, d]; simp
|
||
have : dist z₁.re z₀.re = |z₁.re - z₀.re| := by exact rfl
|
||
rw [this]
|
||
have : dist z₁.im z₀.im = |z₁.im - z₀.im| := by exact rfl
|
||
rw [this]
|
||
simp
|
||
rw [← Complex.dist_eq_re_im]; simp
|
||
exact hz₁
|
||
obtain ⟨ε, h₁ε, h₂ε⟩ := Metric.isOpen_iff.1 lem₀Ω 0 lem₁Ω
|
||
|
||
let ε' := (2 : ℝ)⁻¹ * ε
|
||
|
||
have h₀ε' : ε' ∈ Omega := by
|
||
apply h₂ε
|
||
dsimp [ε']; simp
|
||
have : |ε| = ε := by apply abs_of_pos h₁ε
|
||
rw [this]
|
||
apply (inv_mul_lt_iff₀ zero_lt_two).mpr
|
||
linarith
|
||
have h₁ε' : 0 < ε' := by
|
||
apply mul_pos _ h₁ε
|
||
apply inv_pos.mpr
|
||
exact zero_lt_two
|
||
|
||
use ε'
|
||
|
||
constructor
|
||
· exact h₁ε'
|
||
· dsimp [Omega] at h₀ε'; simp at h₀ε'
|
||
rwa [abs_of_nonneg (h₁d ε')] at h₀ε'
|
||
|
||
let rx := dist z₁.re z₀.re + ε
|
||
let ry := dist z₁.im z₀.im + ε
|
||
|
||
have h'ry : 0 < ry := by
|
||
dsimp [ry]
|
||
apply add_pos_of_nonneg_of_pos
|
||
exact dist_nonneg
|
||
simpa
|
||
|
||
have h'f : DifferentiableOn ℂ f (Metric.ball z₀.re rx ×ℂ Metric.ball z₀.im ry) := by
|
||
apply hf.mono
|
||
intro x hx
|
||
simp
|
||
rw [Complex.dist_eq_re_im]
|
||
|
||
have t₀ : dist x.re z₀.re < rx := Metric.mem_ball.mp hx.1
|
||
have t₁ : dist x.im z₀.im < ry := Metric.mem_ball.mp hx.2
|
||
have t₂ : √((x.re - z₀.re) ^ 2 + (x.im - z₀.im) ^ 2) < √( rx ^ 2 + ry ^ 2) := by
|
||
rw [Real.sqrt_lt_sqrt_iff]
|
||
apply add_lt_add
|
||
· rw [sq_lt_sq]
|
||
dsimp [dist] at t₀
|
||
nth_rw 2 [abs_of_nonneg]
|
||
assumption
|
||
apply add_nonneg dist_nonneg (le_of_lt h₀ε)
|
||
· rw [sq_lt_sq]
|
||
dsimp [dist] at t₁
|
||
nth_rw 2 [abs_of_nonneg]
|
||
assumption
|
||
apply add_nonneg dist_nonneg (le_of_lt h₀ε)
|
||
apply add_nonneg
|
||
exact sq_nonneg (x.re - z₀.re)
|
||
exact sq_nonneg (x.im - z₀.im)
|
||
|
||
calc √((x.re - z₀.re) ^ 2 + (x.im - z₀.im) ^ 2)
|
||
_ < √( rx ^ 2 + ry ^ 2) := by
|
||
exact t₂
|
||
_ = d ε := by dsimp [d, rx, ry]
|
||
_ < R := by exact h₁ε
|
||
|
||
have h'z₁ : z₁ ∈ (Metric.ball z₀.re rx ×ℂ Metric.ball z₀.im ry) := by
|
||
dsimp [rx, ry]
|
||
constructor
|
||
· simp; exact h₀ε
|
||
· simp; exact h₀ε
|
||
|
||
obtain ⟨εx, hεx, εy, hεy, hε⟩ := primitive_additivity h'f h'ry h'z₁
|
||
|
||
apply Filter.eventuallyEq_iff_exists_mem.2
|
||
use (Metric.ball z₁.re εx ×ℂ Metric.ball z₁.im εy)
|
||
constructor
|
||
· apply IsOpen.mem_nhds
|
||
apply IsOpen.reProdIm
|
||
exact Metric.isOpen_ball
|
||
exact Metric.isOpen_ball
|
||
constructor
|
||
· simpa
|
||
· simpa
|
||
· intro x hx
|
||
simp
|
||
rw [← sub_zero (primitive z₀ f x), ← hε x hx]
|
||
abel
|
||
|
||
|
||
theorem primitive_hasDerivAt
|
||
{E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
|
||
{f : ℂ → E}
|
||
{z₀ z : ℂ}
|
||
{R : ℝ}
|
||
(hf : DifferentiableOn ℂ f (Metric.ball z₀ R))
|
||
(hz : z ∈ Metric.ball z₀ R) :
|
||
HasDerivAt (primitive z₀ f) (f z) z := by
|
||
|
||
let A := primitive_additivity' hf hz
|
||
rw [Filter.EventuallyEq.hasDerivAt_iff A]
|
||
rw [← add_zero (f z)]
|
||
apply HasDerivAt.add
|
||
|
||
let R' := R - dist z z₀
|
||
have h₀R' : 0 < R' := by
|
||
dsimp [R']
|
||
simp
|
||
exact hz
|
||
have h₁R' : Metric.ball z R' ⊆ Metric.ball z₀ R := by
|
||
intro x hx
|
||
simp
|
||
calc dist x z₀
|
||
_ ≤ dist x z + dist z z₀ := dist_triangle x z z₀
|
||
_ < R' + dist z z₀ := by
|
||
refine add_lt_add_right ?bc (dist z z₀)
|
||
exact hx
|
||
_ = R := by
|
||
dsimp [R']
|
||
simp
|
||
|
||
apply primitive_hasDerivAtBasepoint
|
||
exact h₀R'
|
||
apply ContinuousOn.mono hf.continuousOn h₁R'
|
||
apply hasDerivAt_const
|
||
|
||
|
||
theorem primitive_differentiableOn
|
||
{E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
|
||
{f : ℂ → E}
|
||
{z₀ : ℂ}
|
||
{R : ℝ}
|
||
(hf : DifferentiableOn ℂ f (Metric.ball z₀ R))
|
||
:
|
||
DifferentiableOn ℂ (primitive z₀ f) (Metric.ball z₀ R) := by
|
||
intro z hz
|
||
apply DifferentiableAt.differentiableWithinAt
|
||
exact (primitive_hasDerivAt hf hz).differentiableAt
|
||
|
||
|
||
theorem primitive_hasFderivAt
|
||
{E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
|
||
{f : ℂ → E}
|
||
(z₀ : ℂ)
|
||
(R : ℝ)
|
||
(hf : DifferentiableOn ℂ f (Metric.ball z₀ R))
|
||
:
|
||
∀ z ∈ Metric.ball z₀ R, HasFDerivAt (primitive z₀ f) ((ContinuousLinearMap.lsmul ℂ ℂ).flip (f z)) z := by
|
||
intro z hz
|
||
rw [hasFDerivAt_iff_hasDerivAt]
|
||
simp
|
||
apply primitive_hasDerivAt hf hz
|
||
|
||
|
||
theorem primitive_hasFderivAt'
|
||
{f : ℂ → ℂ}
|
||
{z₀ : ℂ}
|
||
{R : ℝ}
|
||
(hf : DifferentiableOn ℂ f (Metric.ball z₀ R))
|
||
:
|
||
∀ z ∈ Metric.ball z₀ R, HasFDerivAt (primitive z₀ f) (ContinuousLinearMap.lsmul ℂ ℂ (f z)) z := by
|
||
intro z hz
|
||
rw [hasFDerivAt_iff_hasDerivAt]
|
||
simp
|
||
exact primitive_hasDerivAt hf hz
|
||
|
||
|
||
theorem primitive_fderiv
|
||
{E : Type u} [NormedAddCommGroup E] [NormedSpace ℂ E] [CompleteSpace E]
|
||
{f : ℂ → E}
|
||
{z₀ : ℂ}
|
||
{R : ℝ}
|
||
(hf : DifferentiableOn ℂ f (Metric.ball z₀ R))
|
||
:
|
||
∀ z ∈ Metric.ball z₀ R, (fderiv ℂ (primitive z₀ f) z) = (ContinuousLinearMap.lsmul ℂ ℂ).flip (f z) := by
|
||
intro z hz
|
||
apply HasFDerivAt.fderiv
|
||
exact primitive_hasFderivAt z₀ R hf z hz
|
||
|
||
|
||
theorem primitive_fderiv'
|
||
{f : ℂ → ℂ}
|
||
{z₀ : ℂ}
|
||
{R : ℝ}
|
||
(hf : DifferentiableOn ℂ f (Metric.ball z₀ R))
|
||
:
|
||
∀ z ∈ Metric.ball z₀ R, (fderiv ℂ (primitive z₀ f) z) = ContinuousLinearMap.lsmul ℂ ℂ (f z) := by
|
||
intro z hz
|
||
apply HasFDerivAt.fderiv
|
||
exact primitive_hasFderivAt' hf z hz
|