2024-05-09 15:09:14 -04:00
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/-
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Copyright (c) 2024 Joseph Tooby-Smith. All rights reserved.
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Released under Apache 2.0 license.
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Authors: Joseph Tooby-Smith
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-/
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2024-06-25 07:06:32 -04:00
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import HepLean.SpaceTime.Basic
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import HepLean.StandardModel.Basic
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import HepLean.StandardModel.HiggsBoson.TargetSpace
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import Mathlib.Data.Complex.Exponential
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import Mathlib.Tactic.Polyrith
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import Mathlib.Geometry.Manifold.VectorBundle.Basic
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import Mathlib.Geometry.Manifold.VectorBundle.SmoothSection
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import Mathlib.Geometry.Manifold.Instances.Real
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import Mathlib.RepresentationTheory.Basic
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import Mathlib.Analysis.InnerProductSpace.Basic
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import Mathlib.Analysis.InnerProductSpace.Adjoint
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import Mathlib.Geometry.Manifold.ContMDiff.Product
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import Mathlib.Algebra.QuadraticDiscriminant
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/-!
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# The Higgs field
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This file defines the basic properties for the higgs field in the standard model.
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## References
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- We use conventions given in: https://pdg.lbl.gov/2019/reviews/rpp2019-rev-higgs-boson.pdf
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-/
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universe v u
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namespace StandardModel
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noncomputable section
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open Manifold
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open Matrix
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open Complex
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open ComplexConjugate
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open spaceTime
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/-- The trivial vector bundle 𝓡² × ℂ². (TODO: Make associated bundle.) -/
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abbrev higgsBundle := Bundle.Trivial spaceTime higgsVec
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instance : SmoothVectorBundle higgsVec higgsBundle spaceTime.asSmoothManifold :=
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Bundle.Trivial.smoothVectorBundle higgsVec 𝓘(ℝ, spaceTime)
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/-- A higgs field is a smooth section of the higgs bundle. -/
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abbrev higgsField : Type := SmoothSection spaceTime.asSmoothManifold higgsVec higgsBundle
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instance : NormedAddCommGroup (Fin 2 → ℂ) := by
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exact Pi.normedAddCommGroup
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/-- Given a vector `ℂ²` the constant higgs field with value equal to that
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section. -/
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noncomputable def higgsVec.toField (φ : higgsVec) : higgsField where
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toFun := fun _ ↦ φ
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contMDiff_toFun := by
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intro x
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rw [Bundle.contMDiffAt_section]
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exact smoothAt_const
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namespace higgsField
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open Complex Real
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/-- Given a `higgsField`, the corresponding map from `spaceTime` to `higgsVec`. -/
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def toHiggsVec (φ : higgsField) : spaceTime → higgsVec := φ
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lemma toHiggsVec_smooth (φ : higgsField) : Smooth 𝓘(ℝ, spaceTime) 𝓘(ℝ, higgsVec) φ.toHiggsVec := by
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intro x0
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have h1 := φ.contMDiff x0
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rw [Bundle.contMDiffAt_section] at h1
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have h2 :
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(fun x => ((trivializationAt higgsVec (Bundle.Trivial spaceTime higgsVec) x0)
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{ proj := x, snd := φ x }).2) = φ := by
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rfl
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simp only [h2] at h1
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exact h1
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lemma toField_toHiggsVec_apply (φ : higgsField) (x : spaceTime) :
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(φ.toHiggsVec x).toField x = φ x := rfl
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lemma higgsVecToFin2ℂ_toHiggsVec (φ : higgsField) :
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higgsVecToFin2ℂ ∘ φ.toHiggsVec = φ := rfl
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lemma toVec_smooth (φ : higgsField) : Smooth 𝓘(ℝ, spaceTime) 𝓘(ℝ, Fin 2 → ℂ) φ :=
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smooth_higgsVecToFin2ℂ.comp φ.toHiggsVec_smooth
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lemma apply_smooth (φ : higgsField) :
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∀ i, Smooth 𝓘(ℝ, spaceTime) 𝓘(ℝ, ℂ) (fun (x : spaceTime) => (φ x i)) :=
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(smooth_pi_space).mp (φ.toVec_smooth)
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lemma apply_re_smooth (φ : higgsField) (i : Fin 2):
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Smooth 𝓘(ℝ, spaceTime) 𝓘(ℝ, ℝ) (reCLM ∘ (fun (x : spaceTime) => (φ x i))) :=
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(ContinuousLinearMap.smooth reCLM).comp (φ.apply_smooth i)
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lemma apply_im_smooth (φ : higgsField) (i : Fin 2):
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Smooth 𝓘(ℝ, spaceTime) 𝓘(ℝ, ℝ) (imCLM ∘ (fun (x : spaceTime) => (φ x i))) :=
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(ContinuousLinearMap.smooth imCLM).comp (φ.apply_smooth i)
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/-- Given two `higgsField`, the map `spaceTime → ℂ` obtained by taking their inner product. -/
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def innerProd (φ1 φ2 : higgsField) : spaceTime → ℂ := fun x => ⟪φ1 x, φ2 x⟫_ℂ
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/-- Given a `higgsField`, the map `spaceTime → ℝ` obtained by taking the square norm of the
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higgs vector. -/
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@[simp]
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def normSq (φ : higgsField) : spaceTime → ℝ := fun x => ( ‖φ x‖ ^ 2)
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lemma toHiggsVec_norm (φ : higgsField) (x : spaceTime) :
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‖φ x‖ = ‖φ.toHiggsVec x‖ := rfl
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lemma normSq_expand (φ : higgsField) :
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φ.normSq = fun x => (conj (φ x 0) * (φ x 0) + conj (φ x 1) * (φ x 1) ).re := by
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funext x
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simp [normSq, add_re, mul_re, conj_re, conj_im, neg_mul, sub_neg_eq_add, @norm_sq_eq_inner ℂ]
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lemma normSq_smooth (φ : higgsField) : Smooth 𝓘(ℝ, spaceTime) 𝓘(ℝ, ℝ) φ.normSq := by
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rw [normSq_expand]
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refine Smooth.add ?_ ?_
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simp only [mul_re, conj_re, conj_im, neg_mul, sub_neg_eq_add]
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refine Smooth.add ?_ ?_
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refine Smooth.smul ?_ ?_
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exact φ.apply_re_smooth 0
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exact φ.apply_re_smooth 0
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refine Smooth.smul ?_ ?_
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exact φ.apply_im_smooth 0
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exact φ.apply_im_smooth 0
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simp only [mul_re, conj_re, conj_im, neg_mul, sub_neg_eq_add]
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refine Smooth.add ?_ ?_
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refine Smooth.smul ?_ ?_
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exact φ.apply_re_smooth 1
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exact φ.apply_re_smooth 1
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refine Smooth.smul ?_ ?_
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exact φ.apply_im_smooth 1
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exact φ.apply_im_smooth 1
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lemma normSq_nonneg (φ : higgsField) (x : spaceTime) : 0 ≤ φ.normSq x := by
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simp [normSq, ge_iff_le, norm_nonneg, pow_nonneg]
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lemma normSq_zero (φ : higgsField) (x : spaceTime) : φ.normSq x = 0 ↔ φ x = 0 := by
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simp [normSq, ne_eq, OfNat.ofNat_ne_zero, not_false_eq_true, pow_eq_zero_iff, norm_eq_zero]
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/-- The Higgs potential of the form `- μ² * |φ|² + λ * |φ|⁴`. -/
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@[simp]
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def potential (φ : higgsField) (μSq lambda : ℝ ) (x : spaceTime) : ℝ :=
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- μSq * φ.normSq x + lambda * φ.normSq x * φ.normSq x
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lemma potential_smooth (φ : higgsField) (μSq lambda : ℝ) :
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Smooth 𝓘(ℝ, spaceTime) 𝓘(ℝ, ℝ) (fun x => φ.potential μSq lambda x) := by
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simp only [potential, normSq, neg_mul]
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exact (smooth_const.smul φ.normSq_smooth).neg.add
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((smooth_const.smul φ.normSq_smooth).smul φ.normSq_smooth)
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lemma potential_apply (φ : higgsField) (μSq lambda : ℝ) (x : spaceTime) :
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(φ.potential μSq lambda) x = higgsVec.potential μSq lambda (φ.toHiggsVec x) := by
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simp [higgsVec.potential, toHiggsVec_norm]
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ring
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/-- A higgs field is constant if it is equal for all `x` `y` in `spaceTime`. -/
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def isConst (Φ : higgsField) : Prop := ∀ x y, Φ x = Φ y
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lemma isConst_of_higgsVec (φ : higgsVec) : φ.toField.isConst := by
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intro x _
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simp [higgsVec.toField]
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lemma isConst_iff_of_higgsVec (Φ : higgsField) : Φ.isConst ↔ ∃ (φ : higgsVec), Φ = φ.toField :=
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Iff.intro (fun h ↦ ⟨Φ 0, by ext x y; rw [← h x 0]; rfl⟩) (fun ⟨φ, hφ⟩ x y ↦ by subst hφ; rfl)
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lemma normSq_of_higgsVec (φ : higgsVec) : φ.toField.normSq = fun x => (norm φ) ^ 2 := by
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funext x
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simp [normSq, higgsVec.toField]
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lemma potential_of_higgsVec (φ : higgsVec) (μSq lambda : ℝ) :
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φ.toField.potential μSq lambda = fun _ => higgsVec.potential μSq lambda φ := by
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simp [higgsVec.potential]
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unfold potential
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rw [normSq_of_higgsVec]
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ring_nf
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end higgsField
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end
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end StandardModel
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