feat: Unit and metric for Weyl

HepLean/SpaceTime/WeylFermion/Basic.lean

@@ -9,6 +9,7 @@ import Mathlib.RepresentationTheory.Rep
 import HepLean.Tensors.Basic
 import HepLean.SpaceTime.WeylFermion.Modules
 import Mathlib.Logic.Equiv.TransferInstance
+import LLMlean
 /-!
 
 # Weyl fermions
@@ -47,6 +48,18 @@ def leftHanded : Rep ℂ SL(2,ℂ) := Rep.of {
     simp only [LinearMap.coe_mk, AddHom.coe_mk, LinearMap.mul_apply, LinearEquiv.apply_symm_apply,
       mulVec_mulVec]}
 
+/-- The standard basis on left-handed Weyl fermions. -/
+def leftBasis : Basis (Fin 2) ℂ leftHanded := Basis.ofEquivFun
+  (Equiv.linearEquiv ℂ LeftHandedModule.toFin2ℂFun)
+
+@[simp]
+lemma leftBasis_ρ_apply (M : SL(2,ℂ)) (i j : Fin 2) :
+    (LinearMap.toMatrix leftBasis leftBasis) (leftHanded.ρ M) i j = M.1 i j := by
+  rw [LinearMap.toMatrix_apply]
+  simp [leftBasis]
+  change (M.1 *ᵥ (Pi.single j 1)) i = _
+  simp only [mulVec_single, mul_one]
+
 /-- The vector space ℂ^2 carrying the representation of SL(2,C) given by
     M → (M⁻¹)ᵀ. In index notation corresponds to a Weyl fermion with indices ψ^a. -/
 def altLeftHanded : Rep ℂ SL(2,ℂ) := Rep.of {
@@ -70,6 +83,18 @@ def altLeftHanded : Rep ℂ SL(2,ℂ) := Rep.of {
     rw [Matrix.mul_inv_rev]
     exact transpose_mul _ _}
 
+/-- The standard basis on alt-left-handed Weyl fermions. -/
+def altLeftBasis : Basis (Fin 2) ℂ altLeftHanded := Basis.ofEquivFun
+  (Equiv.linearEquiv ℂ AltLeftHandedModule.toFin2ℂFun)
+
+@[simp]
+lemma altLeftBasis_ρ_apply (M : SL(2,ℂ)) (i j : Fin 2) :
+    (LinearMap.toMatrix altLeftBasis altLeftBasis) (altLeftHanded.ρ M) i j = (M.1⁻¹)ᵀ i j := by
+  rw [LinearMap.toMatrix_apply]
+  simp only [altLeftBasis, Basis.coe_ofEquivFun, Basis.ofEquivFun_repr_apply, transpose_apply]
+  change ((M.1⁻¹)ᵀ *ᵥ (Pi.single j 1)) i = _
+  simp only [mulVec_single, transpose_apply, mul_one]
+
 /-- The vector space ℂ^2 carrying the conjugate representation of SL(2,C).
   In index notation corresponds to a Weyl fermion with indices ψ_{dot a}. -/
 def rightHanded : Rep ℂ SL(2,ℂ) := Rep.of {
@@ -90,6 +115,18 @@ def rightHanded : Rep ℂ SL(2,ℂ) := Rep.of {
     simp only [SpecialLinearGroup.coe_mul, RCLike.star_def, Matrix.map_mul, LinearMap.coe_mk,
       AddHom.coe_mk, LinearMap.mul_apply, LinearEquiv.apply_symm_apply, mulVec_mulVec]}
 
+/-- The standard basis on right-handed Weyl fermions. -/
+def rightBasis : Basis (Fin 2) ℂ rightHanded := Basis.ofEquivFun
+  (Equiv.linearEquiv ℂ RightHandedModule.toFin2ℂFun)
+
+@[simp]
+lemma rightBasis_ρ_apply (M : SL(2,ℂ)) (i j : Fin 2) :
+    (LinearMap.toMatrix rightBasis rightBasis) (rightHanded.ρ M) i j = (M.1.map star) i j := by
+  rw [LinearMap.toMatrix_apply]
+  simp only [rightBasis, Basis.coe_ofEquivFun, Basis.ofEquivFun_repr_apply, transpose_apply]
+  change (M.1.map star *ᵥ (Pi.single j 1)) i = _
+  simp only [mulVec_single, transpose_apply, mul_one]
+
 /-- The vector space ℂ^2 carrying the representation of SL(2,C) given by
     M → (M⁻¹)^†.
     In index notation this corresponds to a Weyl fermion with index `ψ^{dot a}`. -/
@@ -114,6 +151,19 @@ def altRightHanded : Rep ℂ SL(2,ℂ) := Rep.of {
     rw [Matrix.mul_inv_rev]
     exact conjTranspose_mul _ _}
 
+/-- The standard basis on alt-right-handed Weyl fermions. -/
+def altRightBasis : Basis (Fin 2) ℂ altRightHanded := Basis.ofEquivFun
+  (Equiv.linearEquiv ℂ AltRightHandedModule.toFin2ℂFun)
+
+@[simp]
+lemma altRightBasis_ρ_apply (M : SL(2,ℂ)) (i j : Fin 2) :
+    (LinearMap.toMatrix altRightBasis altRightBasis) (altRightHanded.ρ M) i j =
+    ((M.1⁻¹).conjTranspose) i j := by
+  rw [LinearMap.toMatrix_apply]
+  simp only [altRightBasis, Basis.coe_ofEquivFun, Basis.ofEquivFun_repr_apply, transpose_apply]
+  change ((M.1⁻¹).conjTranspose *ᵥ (Pi.single j 1)) i = _
+  simp only [mulVec_single, transpose_apply, mul_one]
+
 /-!
 
 ## Equivalences between Weyl fermion vector spaces.

HepLean/SpaceTime/WeylFermion/Contraction.lean

@@ -4,10 +4,13 @@ Released under Apache 2.0 license as described in the file LICENSE.
 Authors: Joseph Tooby-Smith
 -/
 import HepLean.SpaceTime.WeylFermion.Basic
+import LLMlean
 /-!
 
 # Contraction of Weyl fermions
 
+We define the contraction of Weyl fermions.
+
 -/
 
 namespace Fermion
@@ -128,9 +131,7 @@ def altRightBi : altRightHanded →ₗ[ℂ] rightHanded →ₗ[ℂ] ℂ where
     In index notation this is ψ_a φ^a. -/
 def leftAltContraction : leftHanded ⊗ altLeftHanded ⟶ 𝟙_ (Rep ℂ SL(2,ℂ)) where
   hom := TensorProduct.lift leftAltBi
-  comm M := by
-    apply TensorProduct.ext'
-    intro ψ φ
+  comm M := TensorProduct.ext' fun ψ φ => by
     change (M.1 *ᵥ ψ.toFin2ℂ) ⬝ᵥ (M.1⁻¹ᵀ *ᵥ φ.toFin2ℂ) = ψ.toFin2ℂ ⬝ᵥ φ.toFin2ℂ
     rw [dotProduct_mulVec, vecMul_transpose, mulVec_mulVec]
     simp
@@ -148,9 +149,7 @@ lemma leftAltContraction_hom_tmul (ψ : leftHanded) (φ : altLeftHanded) :
     In index notation this is φ^a ψ_a. -/
 def altLeftContraction : altLeftHanded ⊗ leftHanded ⟶ 𝟙_ (Rep ℂ SL(2,ℂ)) where
   hom := TensorProduct.lift altLeftBi
-  comm M := by
-    apply TensorProduct.ext'
-    intro φ ψ
+  comm M := TensorProduct.ext' fun φ ψ => by
     change (M.1⁻¹ᵀ *ᵥ φ.toFin2ℂ) ⬝ᵥ (M.1 *ᵥ ψ.toFin2ℂ) = φ.toFin2ℂ ⬝ᵥ ψ.toFin2ℂ
     rw [dotProduct_mulVec, mulVec_transpose, vecMul_vecMul]
     simp
@@ -170,13 +169,9 @@ The linear map from rightHandedWeyl ⊗ altRightHandedWeyl to ℂ given by
 -/
 def rightAltContraction : rightHanded ⊗ altRightHanded ⟶ 𝟙_ (Rep ℂ SL(2,ℂ)) where
   hom := TensorProduct.lift rightAltBi
-  comm M := by
-    apply TensorProduct.ext'
-    intro ψ φ
+  comm M := TensorProduct.ext' fun ψ φ => by
     change (M.1.map star *ᵥ ψ.toFin2ℂ) ⬝ᵥ (M.1⁻¹.conjTranspose *ᵥ φ.toFin2ℂ) = ψ.toFin2ℂ ⬝ᵥ φ.toFin2ℂ
-    have h1 : (M.1)⁻¹ᴴ = ((M.1)⁻¹.map star)ᵀ := by
-      rw [conjTranspose]
-      exact rfl
+    have h1 : (M.1)⁻¹ᴴ = ((M.1)⁻¹.map star)ᵀ := by rfl
     rw [dotProduct_mulVec, h1, vecMul_transpose, mulVec_mulVec]
     have h2 : ((M.1)⁻¹.map star * (M.1).map star) = 1 := by
       refine transpose_inj.mp ?_
@@ -189,23 +184,18 @@ def rightAltContraction : rightHanded ⊗ altRightHanded ⟶ 𝟙_ (Rep ℂ SL(2
     simp only [one_mulVec, vec2_dotProduct, Fin.isValue, RightHandedModule.toFin2ℂEquiv_apply,
       AltRightHandedModule.toFin2ℂEquiv_apply]
 
-informal_definition altRightWeylContraction where
-  math :≈ "The linear map from altRightHandedWeyl ⊗ rightHandedWeyl to ℂ given by
+/--
+  The linear map from altRightHandedWeyl ⊗ rightHandedWeyl to ℂ given by
     summing over components of altRightHandedWeyl and rightHandedWeyl in the
-    standard basis (i.e. the dot product)."
-  physics :≈ "The contraction of a right-handed Weyl fermion with a left-handed Weyl fermion.
-    In index notation this is φ^{dot a} ψ_{dot a}."
-  deps :≈ [``rightHanded, ``altRightHanded]
-
+    standard basis (i.e. the dot product).
+  The contraction of a right-handed Weyl fermion with a left-handed Weyl fermion.
+    In index notation this is φ^{dot a} ψ_{dot a}.
+-/
 def altRightContraction : altRightHanded ⊗ rightHanded ⟶ 𝟙_ (Rep ℂ SL(2,ℂ)) where
   hom := TensorProduct.lift altRightBi
-  comm M := by
-    apply TensorProduct.ext'
-    intro φ ψ
+  comm M := TensorProduct.ext' fun φ ψ =>  by
     change (M.1⁻¹.conjTranspose *ᵥ φ.toFin2ℂ) ⬝ᵥ (M.1.map star *ᵥ ψ.toFin2ℂ) = φ.toFin2ℂ ⬝ᵥ ψ.toFin2ℂ
-    have h1 : (M.1)⁻¹ᴴ = ((M.1)⁻¹.map star)ᵀ := by
-      rw [conjTranspose]
-      exact rfl
+    have h1 : (M.1)⁻¹ᴴ = ((M.1)⁻¹.map star)ᵀ := by rfl
     rw [dotProduct_mulVec, h1, mulVec_transpose, vecMul_vecMul]
     have h2 : ((M.1)⁻¹.map star * (M.1).map star) = 1 := by
       refine transpose_inj.mp ?_
@@ -270,13 +260,12 @@ informal_lemma rightAltWeylContraction_invariant where
 informal_lemma rightAltWeylContraction_symm_altRightWeylContraction where
   math :≈ "The linear map altRightWeylContraction is rightAltWeylContraction composed
     with the braiding of the tensor product."
-  deps :≈ [``rightAltContraction, ``altRightWeylContraction]
+  deps :≈ [``rightAltContraction, ``altRightContraction]
 
 informal_lemma altRightWeylContraction_invariant where
   math :≈ "The contraction altRightWeylContraction is invariant with respect to
     the action of SL(2,C) on rightHandedWeyl and altRightHandedWeyl."
-  deps :≈ [``altRightWeylContraction]
-
+  deps :≈ [``altRightContraction]
 
 end
 end Fermion

HepLean/SpaceTime/WeylFermion/Metric.lean

@@ -0,0 +1,213 @@
+/-
+Copyright (c) 2024 Joseph Tooby-Smith. All rights reserved.
+Released under Apache 2.0 license as described in the file LICENSE.
+Authors: Joseph Tooby-Smith
+-/
+import HepLean.SpaceTime.WeylFermion.Basic
+import HepLean.SpaceTime.WeylFermion.Contraction
+import Mathlib.LinearAlgebra.TensorProduct.Matrix
+import HepLean.SpaceTime.WeylFermion.Two
+/-!
+
+# Metrics of Weyl fermions
+
+We define the metrics for Weyl fermions, often denoted `ε` in the literature.
+These allow us to go from left-handed to alt-left-handed Weyl fermions and back,
+and  from right-handed to alt-right-handed Weyl fermions and back.
+
+-/
+
+namespace Fermion
+noncomputable section
+
+open Matrix
+open MatrixGroups
+open Complex
+open TensorProduct
+open CategoryTheory.MonoidalCategory
+
+def metricRaw : Matrix (Fin 2) (Fin 2) ℂ := !![0, 1; -1, 0]
+
+lemma comm_metricRaw (M : SL(2,ℂ)) : M.1 * metricRaw = metricRaw * (M.1⁻¹)ᵀ := by
+  rw [metricRaw]
+  rw [SpaceTime.SL2C.inverse_coe, eta_fin_two M.1]
+  rw [SpecialLinearGroup.coe_inv, Matrix.adjugate_fin_two,
+      Matrix.mul_fin_two, eta_fin_two !![M.1 1 1, -M.1 0 1; -M.1 1 0, M.1 0 0]ᵀ]
+  simp only [Fin.isValue, mul_zero, mul_neg, mul_one, zero_add, add_zero, transpose_apply, of_apply,
+    cons_val', cons_val_zero, empty_val', cons_val_fin_one, cons_val_one, head_fin_const, head_cons,
+    cons_mul, Nat.succ_eq_add_one, Nat.reduceAdd, vecMul_cons, zero_smul, tail_cons, one_smul,
+    empty_vecMul, neg_smul, neg_cons, neg_neg, neg_empty, empty_mul, Equiv.symm_apply_apply]
+
+lemma metricRaw_comm (M : SL(2,ℂ)) : metricRaw * M.1 = (M.1⁻¹)ᵀ * metricRaw := by
+  rw [metricRaw]
+  rw [SpaceTime.SL2C.inverse_coe, eta_fin_two M.1]
+  rw [SpecialLinearGroup.coe_inv, Matrix.adjugate_fin_two,
+      Matrix.mul_fin_two, eta_fin_two !![M.1 1 1, -M.1 0 1; -M.1 1 0, M.1 0 0]ᵀ]
+  simp only [Fin.isValue, zero_mul, one_mul, zero_add, neg_mul, add_zero, transpose_apply, of_apply,
+    cons_val', cons_val_zero, empty_val', cons_val_fin_one, cons_val_one, head_fin_const, head_cons,
+    cons_mul, Nat.succ_eq_add_one, Nat.reduceAdd, vecMul_cons, smul_cons, smul_eq_mul, mul_zero,
+    mul_one, smul_empty, tail_cons, neg_smul, mul_neg, neg_cons, neg_neg, neg_zero, neg_empty,
+    empty_vecMul, add_cons, empty_add_empty, empty_mul, Equiv.symm_apply_apply]
+
+lemma star_comm_metricRaw  (M : SL(2,ℂ)) : M.1.map star * metricRaw = metricRaw * ((M.1)⁻¹)ᴴ := by
+  rw [metricRaw]
+  rw [SpaceTime.SL2C.inverse_coe, eta_fin_two M.1]
+  rw [SpecialLinearGroup.coe_inv, Matrix.adjugate_fin_two,
+      eta_fin_two !![M.1 1 1, -M.1 0 1; -M.1 1 0, M.1 0 0]ᴴ]
+  rw [eta_fin_two (!![M.1 0 0, M.1 0 1; M.1 1 0, M.1 1 1].map star)]
+  simp
+
+lemma metricRaw_comm_star (M : SL(2,ℂ)) : metricRaw * M.1.map star = ((M.1)⁻¹)ᴴ * metricRaw := by
+  rw [metricRaw]
+  rw [SpaceTime.SL2C.inverse_coe, eta_fin_two M.1]
+  rw [SpecialLinearGroup.coe_inv, Matrix.adjugate_fin_two,
+      eta_fin_two !![M.1 1 1, -M.1 0 1; -M.1 1 0, M.1 0 0]ᴴ]
+  rw [eta_fin_two (!![M.1 0 0, M.1 0 1; M.1 1 0, M.1 1 1].map star)]
+  simp
+
+/-- The metric `εₐₐ` as an element of `(leftHanded ⊗ leftHanded).V`. -/
+def leftMetricVal : (leftHanded ⊗ leftHanded).V :=
+  leftLeftToMatrix.symm (- metricRaw)
+
+/-- The metric `εₐₐ` as a morphism `𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ leftHanded ⊗ leftHanded`,
+  making manifest its invariance under the action of `SL(2,ℂ)`. -/
+def leftMetric : 𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ leftHanded ⊗ leftHanded where
+  hom := {
+    toFun := fun a =>
+      let a' : ℂ := a
+      a' • leftMetricVal,
+    map_add' := fun x y => by
+      simp only [add_smul]
+    map_smul' := fun m x => by
+      simp only [smul_smul]
+      rfl}
+  comm M := by
+    ext x : 2
+    simp
+    let x' : ℂ := x
+    change x' • leftMetricVal =
+      (TensorProduct.map (leftHanded.ρ M) (leftHanded.ρ M)) (x' • leftMetricVal)
+    simp
+    apply congrArg
+    simp [leftMetricVal]
+    erw [leftLeftToMatrix_ρ_symm]
+    apply congrArg
+    rw [comm_metricRaw, mul_assoc, ← @transpose_mul]
+    simp only [SpecialLinearGroup.det_coe, isUnit_iff_ne_zero, ne_eq, one_ne_zero,
+      not_false_eq_true, mul_nonsing_inv, transpose_one, mul_one]
+
+/-- The metric `εᵃᵃ` as an element of `(altLeftHanded ⊗ altLeftHanded).V`. -/
+def altLeftMetricVal : (altLeftHanded ⊗ altLeftHanded).V :=
+  altLeftaltLeftToMatrix.symm metricRaw
+
+/-- The metric `εᵃᵃ` as a morphism `𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ altLeftHanded ⊗ altLeftHanded`,
+  making manifest its invariance under the action of `SL(2,ℂ)`. -/
+def altLeftMetric : 𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ altLeftHanded ⊗ altLeftHanded where
+  hom := {
+    toFun := fun a =>
+      let a' : ℂ := a
+      a' • altLeftMetricVal,
+    map_add' := fun x y => by
+      simp only [add_smul]
+    map_smul' := fun m x => by
+      simp only [smul_smul]
+      rfl}
+  comm M := by
+    ext x : 2
+    simp
+    let x' : ℂ := x
+    change x' • altLeftMetricVal =
+      (TensorProduct.map (altLeftHanded.ρ M) (altLeftHanded.ρ M)) (x' • altLeftMetricVal)
+    simp
+    apply congrArg
+    simp [altLeftMetricVal]
+    erw [altLeftaltLeftToMatrix_ρ_symm]
+    apply congrArg
+    rw [← metricRaw_comm, mul_assoc]
+    simp only [SpecialLinearGroup.det_coe, isUnit_iff_ne_zero, ne_eq, one_ne_zero,
+      not_false_eq_true, mul_nonsing_inv, mul_one]
+
+
+/-- The metric `ε_{dot a}_{dot a}` as an element of `(rightHanded ⊗ rightHanded).V`. -/
+def rightMetricVal : (rightHanded ⊗ rightHanded).V :=
+  rightRightToMatrix.symm (- metricRaw)
+
+/-- The metric `ε_{dot a}_{dot a}` as a morphism `𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ rightHanded ⊗ rightHanded`,
+  making manifest its invariance under the action of `SL(2,ℂ)`. -/
+def rightMetric : 𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ rightHanded ⊗ rightHanded where
+  hom := {
+    toFun := fun a =>
+      let a' : ℂ := a
+      a' • rightMetricVal,
+    map_add' := fun x y => by
+      simp only [add_smul]
+    map_smul' := fun m x => by
+      simp only [smul_smul]
+      rfl}
+  comm M := by
+    ext x : 2
+    simp
+    let x' : ℂ := x
+    change x' • rightMetricVal =
+      (TensorProduct.map (rightHanded.ρ M) (rightHanded.ρ M)) (x' • rightMetricVal)
+    simp only [Action.instMonoidalCategory_tensorObj_V, _root_.map_smul]
+    apply congrArg
+    simp only [Action.instMonoidalCategory_tensorObj_V, rightMetricVal, map_neg, neg_inj]
+    trans rightRightToMatrix.symm ((M.1).map star * metricRaw * ((M.1).map star)ᵀ)
+    · apply congrArg
+      rw [star_comm_metricRaw, mul_assoc]
+      have h1 : ((M.1)⁻¹ᴴ * ((M.1).map star)ᵀ) = 1 := by
+        trans (M.1)⁻¹ᴴ * ((M.1))ᴴ
+        · rfl
+        rw [← @conjTranspose_mul]
+        simp only [SpecialLinearGroup.det_coe, isUnit_iff_ne_zero, ne_eq, one_ne_zero,
+          not_false_eq_true, mul_nonsing_inv, conjTranspose_one]
+      rw [h1]
+      simp
+    · rw [← rightRightToMatrix_ρ_symm metricRaw M]
+      rfl
+
+/-- The metric `ε^{dot a}^{dot a}` as an element of `(altRightHanded ⊗ altRightHanded).V`. -/
+def altRightMetricVal : (altRightHanded ⊗ altRightHanded).V :=
+  altRightAltRightToMatrix.symm (metricRaw)
+
+/-- The metric `ε^{dot a}^{dot a}` as a morphism
+  `𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ altRightHanded ⊗ altRightHanded`,
+  making manifest its invariance under the action of `SL(2,ℂ)`. -/
+def altRightMetric : 𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ altRightHanded ⊗ altRightHanded where
+  hom := {
+    toFun := fun a =>
+      let a' : ℂ := a
+      a' • altRightMetricVal,
+    map_add' := fun x y => by
+      simp only [add_smul]
+    map_smul' := fun m x => by
+      simp only [smul_smul]
+      rfl}
+  comm M := by
+    ext x : 2
+    simp
+    let x' : ℂ := x
+    change x' • altRightMetricVal =
+      (TensorProduct.map (altRightHanded.ρ M) (altRightHanded.ρ M)) (x' • altRightMetricVal)
+    simp only [Action.instMonoidalCategory_tensorObj_V, _root_.map_smul]
+    apply congrArg
+    simp only [Action.instMonoidalCategory_tensorObj_V]
+    trans altRightAltRightToMatrix.symm
+      (((M.1)⁻¹).conjTranspose * metricRaw * (((M.1)⁻¹).conjTranspose)ᵀ)
+    · rw [altRightMetricVal]
+      apply congrArg
+      rw [← metricRaw_comm_star, mul_assoc]
+      have h1 : ((M.1).map star * (M.1)⁻¹ᴴᵀ) = 1 := by
+        refine transpose_eq_one.mp ?_
+        rw [@transpose_mul]
+        simp
+        change (M.1)⁻¹ᴴ * (M.1)ᴴ = 1
+        rw [← @conjTranspose_mul]
+        simp
+      rw [h1, mul_one]
+    · rw [← altRightAltRightToMatrix_ρ_symm metricRaw M]
+      rfl
+
+end
+end Fermion

HepLean/SpaceTime/WeylFermion/Two.lean

@@ -0,0 +1,484 @@
+/-
+Copyright (c) 2024 Joseph Tooby-Smith. All rights reserved.
+Released under Apache 2.0 license as described in the file LICENSE.
+Authors: Joseph Tooby-Smith
+-/
+import HepLean.SpaceTime.WeylFermion.Basic
+import HepLean.SpaceTime.WeylFermion.Contraction
+import Mathlib.LinearAlgebra.TensorProduct.Matrix
+/-!
+
+# Tensor product of two Weyl fermion
+
+
+-/
+
+namespace Fermion
+noncomputable section
+
+open Matrix
+open MatrixGroups
+open Complex
+open TensorProduct
+open CategoryTheory.MonoidalCategory
+
+/-!
+
+## Equivalences to matrices.
+
+-/
+
+/-- Equivalence of `leftHanded ⊗ leftHanded` to `2 x 2` complex matrices. -/
+def leftLeftToMatrix : (leftHanded ⊗ leftHanded).V ≃ₗ[ℂ] Matrix (Fin 2) (Fin 2) ℂ :=
+  (Basis.tensorProduct leftBasis leftBasis).repr ≪≫ₗ
+  Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2) ≪≫ₗ
+  LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)
+
+/-- Equivalence of `altLeftHanded ⊗ altLeftHanded` to `2 x 2` complex matrices. -/
+def altLeftaltLeftToMatrix : (altLeftHanded ⊗ altLeftHanded).V ≃ₗ[ℂ] Matrix (Fin 2) (Fin 2) ℂ :=
+  (Basis.tensorProduct altLeftBasis altLeftBasis).repr ≪≫ₗ
+  Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2) ≪≫ₗ
+  LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)
+
+/-- Equivalence of `leftHanded ⊗ altLeftHanded` to `2 x 2` complex matrices. -/
+def leftAltLeftToMatrix : (leftHanded ⊗ altLeftHanded).V ≃ₗ[ℂ] Matrix (Fin 2) (Fin 2) ℂ :=
+  (Basis.tensorProduct leftBasis altLeftBasis).repr ≪≫ₗ
+  Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2) ≪≫ₗ
+  LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)
+
+/-- Equivalence of `altLeftHanded ⊗ leftHanded` to `2 x 2` complex matrices. -/
+def altLeftLeftToMatrix : (altLeftHanded ⊗ leftHanded).V ≃ₗ[ℂ] Matrix (Fin 2) (Fin 2) ℂ :=
+  (Basis.tensorProduct altLeftBasis leftBasis).repr ≪≫ₗ
+  Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2) ≪≫ₗ
+  LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)
+
+/-- Equivalence of `rightHanded ⊗ rightHanded` to `2 x 2` complex matrices. -/
+def rightRightToMatrix : (rightHanded ⊗ rightHanded).V ≃ₗ[ℂ] Matrix (Fin 2) (Fin 2) ℂ :=
+  (Basis.tensorProduct rightBasis rightBasis).repr ≪≫ₗ
+  Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2) ≪≫ₗ
+  LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)
+
+/-- Equivalence of `altRightHanded ⊗ altRightHanded` to `2 x 2` complex matrices. -/
+def altRightAltRightToMatrix : (altRightHanded ⊗ altRightHanded).V ≃ₗ[ℂ] Matrix (Fin 2) (Fin 2) ℂ :=
+  (Basis.tensorProduct altRightBasis altRightBasis).repr ≪≫ₗ
+  Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2) ≪≫ₗ
+  LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)
+
+/-- Equivalence of `rightHanded ⊗ altRightHanded` to `2 x 2` complex matrices. -/
+def rightAltRightToMatrix : (rightHanded ⊗ altRightHanded).V ≃ₗ[ℂ] Matrix (Fin 2) (Fin 2) ℂ :=
+  (Basis.tensorProduct rightBasis altRightBasis).repr ≪≫ₗ
+  Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2) ≪≫ₗ
+  LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)
+
+/-- Equivalence of `altRightHanded ⊗ rightHanded` to `2 x 2` complex matrices. -/
+def altRightRightToMatrix : (altRightHanded ⊗ rightHanded).V ≃ₗ[ℂ] Matrix (Fin 2) (Fin 2) ℂ :=
+  (Basis.tensorProduct altRightBasis rightBasis).repr ≪≫ₗ
+  Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2) ≪≫ₗ
+  LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)
+
+/-!
+
+## Group actions
+
+-/
+
+/-- The group action of `SL(2,ℂ)` on `leftHanded ⊗ leftHanded` is equivalent to
+  `M.1 * leftLeftToMatrix v * (M.1)ᵀ`. -/
+lemma leftLeftToMatrix_ρ (v : (leftHanded ⊗ leftHanded).V) (M : SL(2,ℂ)) :
+    leftLeftToMatrix (TensorProduct.map (leftHanded.ρ M) (leftHanded.ρ M) v) =
+    M.1 * leftLeftToMatrix v * (M.1)ᵀ := by
+  nth_rewrite 1 [leftLeftToMatrix]
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.trans_apply]
+  trans (LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)) ((LinearMap.toMatrix
+      (leftBasis.tensorProduct leftBasis) (leftBasis.tensorProduct leftBasis)
+      (TensorProduct.map (leftHanded.ρ M) (leftHanded.ρ M)))
+      *ᵥ ((Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2))
+      ((leftBasis.tensorProduct leftBasis).repr (v))))
+  · apply congrArg
+    have h1 := (LinearMap.toMatrix_mulVec_repr (leftBasis.tensorProduct leftBasis)
+       (leftBasis.tensorProduct leftBasis) (TensorProduct.map (leftHanded.ρ M) (leftHanded.ρ M)) v)
+    erw [h1]
+    rfl
+  rw [TensorProduct.toMatrix_map]
+  funext i j
+  change ∑ k, ((kroneckerMap (fun x1 x2 => x1 * x2)
+        ((LinearMap.toMatrix leftBasis leftBasis) (leftHanded.ρ M))
+        ((LinearMap.toMatrix leftBasis leftBasis) (leftHanded.ρ M)) (i, j) k)
+        * leftLeftToMatrix v k.1 k.2) = _
+  erw [Finset.sum_product]
+  simp_rw [kroneckerMap_apply, Matrix.mul_apply, Matrix.transpose_apply]
+  have h1 : ∑ x : Fin 2, (∑ j : Fin 2, M.1 i j * leftLeftToMatrix v j x) * M.1 j x
+    = ∑ x : Fin 2, ∑ x1 : Fin 2, (M.1 i x1 * leftLeftToMatrix v x1 x) * M.1 j x  := by
+    congr
+    funext x
+    rw [Finset.sum_mul]
+  erw [h1]
+  rw [Finset.sum_comm]
+  congr
+  funext x
+  congr
+  funext x1
+  simp only [leftBasis_ρ_apply, Finsupp.linearEquivFunOnFinite_apply,
+    Action.instMonoidalCategory_tensorObj_V]
+  rw [mul_assoc]
+  nth_rewrite 2 [mul_comm]
+  rw [← mul_assoc]
+
+/-- The group action of `SL(2,ℂ)` on `altLeftHanded ⊗ altLeftHanded` is equivalent to
+  `(M.1⁻¹)ᵀ * leftLeftToMatrix v * (M.1⁻¹)`. -/
+lemma altLeftaltLeftToMatrix_ρ (v : (altLeftHanded ⊗ altLeftHanded).V) (M : SL(2,ℂ)) :
+    altLeftaltLeftToMatrix (TensorProduct.map (altLeftHanded.ρ M) (altLeftHanded.ρ M) v) =
+    (M.1⁻¹)ᵀ * altLeftaltLeftToMatrix v * (M.1⁻¹) := by
+  nth_rewrite 1 [altLeftaltLeftToMatrix]
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.trans_apply]
+  trans (LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)) ((LinearMap.toMatrix
+      (altLeftBasis.tensorProduct altLeftBasis) (altLeftBasis.tensorProduct altLeftBasis)
+      (TensorProduct.map (altLeftHanded.ρ M) (altLeftHanded.ρ M)))
+      *ᵥ ((Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2))
+      ((altLeftBasis.tensorProduct altLeftBasis).repr v)))
+  · apply congrArg
+    have h1 := (LinearMap.toMatrix_mulVec_repr (altLeftBasis.tensorProduct altLeftBasis)
+       (altLeftBasis.tensorProduct altLeftBasis)
+       (TensorProduct.map (altLeftHanded.ρ M) (altLeftHanded.ρ M)) v)
+    erw [h1]
+    rfl
+  rw [TensorProduct.toMatrix_map]
+  funext i j
+  change ∑ k, ((kroneckerMap (fun x1 x2 => x1 * x2)
+        ((LinearMap.toMatrix altLeftBasis altLeftBasis) (altLeftHanded.ρ M))
+        ((LinearMap.toMatrix altLeftBasis altLeftBasis) (altLeftHanded.ρ M)) (i, j) k)
+        * altLeftaltLeftToMatrix v k.1 k.2) = _
+  erw [Finset.sum_product]
+  simp_rw [kroneckerMap_apply, Matrix.mul_apply, Matrix.transpose_apply]
+  have h1 : ∑ x : Fin 2, (∑ x1 : Fin 2, (M.1)⁻¹ x1 i * altLeftaltLeftToMatrix v x1 x) * (M.1)⁻¹ x j
+    = ∑ x : Fin 2, ∑ x1 : Fin 2, ((M.1)⁻¹ x1 i * altLeftaltLeftToMatrix v x1 x) * (M.1)⁻¹ x j := by
+    congr
+    funext x
+    rw [Finset.sum_mul]
+  erw [h1]
+  rw [Finset.sum_comm]
+  congr
+  funext x
+  congr
+  funext x1
+  simp only [altLeftBasis_ρ_apply, transpose_apply, Action.instMonoidalCategory_tensorObj_V]
+  ring
+
+/-- The group action of `SL(2,ℂ)` on `leftHanded ⊗ altLeftHanded` is equivalent to
+  `M.1 * leftAltLeftToMatrix v * (M.1⁻¹)`. -/
+lemma leftAltLeftToMatrix_ρ (v : (leftHanded ⊗ altLeftHanded).V) (M : SL(2,ℂ)) :
+    leftAltLeftToMatrix (TensorProduct.map (leftHanded.ρ M) (altLeftHanded.ρ M) v) =
+    M.1 * leftAltLeftToMatrix v * (M.1⁻¹) := by
+  nth_rewrite 1 [leftAltLeftToMatrix]
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.trans_apply]
+  trans (LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)) ((LinearMap.toMatrix
+      (leftBasis.tensorProduct altLeftBasis) (leftBasis.tensorProduct altLeftBasis)
+      (TensorProduct.map (leftHanded.ρ M) (altLeftHanded.ρ M)))
+      *ᵥ ((Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2))
+      ((leftBasis.tensorProduct altLeftBasis).repr (v))))
+  · apply congrArg
+    have h1 := (LinearMap.toMatrix_mulVec_repr (leftBasis.tensorProduct altLeftBasis)
+       (leftBasis.tensorProduct altLeftBasis)
+       (TensorProduct.map (leftHanded.ρ M) (altLeftHanded.ρ M)) v)
+    erw [h1]
+    rfl
+  rw [TensorProduct.toMatrix_map]
+  funext i j
+  change ∑ k, ((kroneckerMap (fun x1 x2 => x1 * x2)
+        ((LinearMap.toMatrix leftBasis leftBasis) (leftHanded.ρ M))
+        ((LinearMap.toMatrix altLeftBasis altLeftBasis) (altLeftHanded.ρ M)) (i, j) k)
+        * leftAltLeftToMatrix v k.1 k.2) = _
+  erw [Finset.sum_product]
+  simp_rw [kroneckerMap_apply, Matrix.mul_apply]
+  have h1 : ∑ x : Fin 2, (∑ x1 : Fin 2, M.1 i x1 * leftAltLeftToMatrix v x1 x) * (M.1⁻¹) x j
+    = ∑ x : Fin 2, ∑ x1 : Fin 2, (M.1 i x1 * leftAltLeftToMatrix v x1 x) * (M.1⁻¹) x j := by
+    congr
+    funext x
+    rw [Finset.sum_mul]
+  erw [h1]
+  rw [Finset.sum_comm]
+  congr
+  funext x
+  congr
+  funext x1
+  simp only [leftBasis_ρ_apply, altLeftBasis_ρ_apply, transpose_apply,
+    Action.instMonoidalCategory_tensorObj_V]
+  ring
+
+/-- The group action of `SL(2,ℂ)` on `altLeftHanded ⊗ leftHanded` is equivalent to
+  `(M.1⁻¹)ᵀ * leftAltLeftToMatrix v * (M.1)ᵀ`. -/
+lemma altLeftLeftToMatrix_ρ (v : (altLeftHanded ⊗ leftHanded).V) (M : SL(2,ℂ)) :
+    altLeftLeftToMatrix (TensorProduct.map (altLeftHanded.ρ M) (leftHanded.ρ M) v) =
+    (M.1⁻¹)ᵀ * altLeftLeftToMatrix v * (M.1)ᵀ := by
+  nth_rewrite 1 [altLeftLeftToMatrix]
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.trans_apply]
+  trans (LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)) ((LinearMap.toMatrix
+      (altLeftBasis.tensorProduct leftBasis) (altLeftBasis.tensorProduct leftBasis)
+      (TensorProduct.map (altLeftHanded.ρ M) (leftHanded.ρ M)))
+      *ᵥ ((Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2))
+      ((altLeftBasis.tensorProduct leftBasis).repr (v))))
+  · apply congrArg
+    have h1 := (LinearMap.toMatrix_mulVec_repr (altLeftBasis.tensorProduct leftBasis)
+       (altLeftBasis.tensorProduct leftBasis)
+       (TensorProduct.map (altLeftHanded.ρ M) (leftHanded.ρ M)) v)
+    erw [h1]
+    rfl
+  rw [TensorProduct.toMatrix_map]
+  funext i j
+  change ∑ k, ((kroneckerMap (fun x1 x2 => x1 * x2)
+        ((LinearMap.toMatrix altLeftBasis altLeftBasis) (altLeftHanded.ρ M))
+        ((LinearMap.toMatrix leftBasis leftBasis) (leftHanded.ρ M)) (i, j) k)
+        * altLeftLeftToMatrix v k.1 k.2) = _
+  erw [Finset.sum_product]
+  simp_rw [kroneckerMap_apply, Matrix.mul_apply, Matrix.transpose_apply]
+  have h1 : ∑ x : Fin 2, (∑ x1 : Fin 2, (M.1)⁻¹ x1 i * altLeftLeftToMatrix v x1 x) * M.1 j x
+    = ∑ x : Fin 2, ∑ x1 : Fin 2, ((M.1)⁻¹ x1 i * altLeftLeftToMatrix v x1 x) * M.1 j x:= by
+    congr
+    funext x
+    rw [Finset.sum_mul]
+  erw [h1]
+  rw [Finset.sum_comm]
+  congr
+  funext x
+  congr
+  funext x1
+  simp only [altLeftBasis_ρ_apply, leftBasis_ρ_apply, transpose_apply,
+    Action.instMonoidalCategory_tensorObj_V]
+  ring
+
+/-- The group action of `SL(2,ℂ)` on `rightHanded ⊗ rightHanded` is equivalent to
+  `(M.1.map star) * rightRightToMatrix v * ((M.1.map star))ᵀ`. -/
+lemma rightRightToMatrix_ρ (v : (rightHanded ⊗ rightHanded).V) (M : SL(2,ℂ)) :
+    rightRightToMatrix (TensorProduct.map (rightHanded.ρ M) (rightHanded.ρ M) v) =
+    (M.1.map star) * rightRightToMatrix v * ((M.1.map star))ᵀ := by
+  nth_rewrite 1 [rightRightToMatrix]
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.trans_apply]
+  trans (LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)) ((LinearMap.toMatrix
+      (rightBasis.tensorProduct rightBasis) (rightBasis.tensorProduct rightBasis)
+      (TensorProduct.map (rightHanded.ρ M) (rightHanded.ρ M)))
+      *ᵥ ((Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2))
+      ((rightBasis.tensorProduct rightBasis).repr (v))))
+  · apply congrArg
+    have h1 := (LinearMap.toMatrix_mulVec_repr (rightBasis.tensorProduct rightBasis)
+       (rightBasis.tensorProduct rightBasis) (TensorProduct.map (rightHanded.ρ M) (rightHanded.ρ M)) v)
+    erw [h1]
+    rfl
+  rw [TensorProduct.toMatrix_map]
+  funext i j
+  change ∑ k, ((kroneckerMap (fun x1 x2 => x1 * x2)
+        ((LinearMap.toMatrix rightBasis rightBasis) (rightHanded.ρ M))
+        ((LinearMap.toMatrix rightBasis rightBasis) (rightHanded.ρ M)) (i, j) k)
+        * rightRightToMatrix v k.1 k.2) = _
+  erw [Finset.sum_product]
+  simp_rw [kroneckerMap_apply, Matrix.mul_apply, Matrix.transpose_apply]
+  have h1 : ∑ x : Fin 2, (∑ x1 : Fin 2, (M.1.map star) i x1 * rightRightToMatrix v x1 x) * (M.1.map star) j x
+    = ∑ x : Fin 2, ∑ x1 : Fin 2, ((M.1.map star) i x1 * rightRightToMatrix v x1 x) * (M.1.map star) j x:= by
+    congr
+    funext x
+    rw [Finset.sum_mul]
+  erw [h1]
+  rw [Finset.sum_comm]
+  congr
+  funext x
+  congr
+  funext x1
+  simp only [rightBasis_ρ_apply, Finsupp.linearEquivFunOnFinite_apply,
+    Action.instMonoidalCategory_tensorObj_V]
+  ring
+
+/-- The group action of `SL(2,ℂ)` on `altRightHanded ⊗ altRightHanded` is equivalent to
+  `((M.1⁻¹).conjTranspose * rightRightToMatrix v * (((M.1⁻¹).conjTranspose)ᵀ`. -/
+lemma altRightAltRightToMatrix_ρ (v : (altRightHanded ⊗ altRightHanded).V) (M : SL(2,ℂ)) :
+    altRightAltRightToMatrix (TensorProduct.map (altRightHanded.ρ M) (altRightHanded.ρ M) v) =
+    ((M.1⁻¹).conjTranspose) * altRightAltRightToMatrix v * (((M.1⁻¹).conjTranspose)ᵀ) := by
+  nth_rewrite 1 [altRightAltRightToMatrix]
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.trans_apply]
+  trans (LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)) ((LinearMap.toMatrix
+      (altRightBasis.tensorProduct altRightBasis) (altRightBasis.tensorProduct altRightBasis)
+      (TensorProduct.map (altRightHanded.ρ M) (altRightHanded.ρ M)))
+      *ᵥ ((Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2))
+      ((altRightBasis.tensorProduct altRightBasis).repr (v))))
+  · apply congrArg
+    have h1 := (LinearMap.toMatrix_mulVec_repr (altRightBasis.tensorProduct altRightBasis)
+       (altRightBasis.tensorProduct altRightBasis)
+       (TensorProduct.map (altRightHanded.ρ M) (altRightHanded.ρ M)) v)
+    erw [h1]
+    rfl
+  rw [TensorProduct.toMatrix_map]
+  funext i j
+  change ∑ k, ((kroneckerMap (fun x1 x2 => x1 * x2)
+        ((LinearMap.toMatrix altRightBasis altRightBasis) (altRightHanded.ρ M))
+        ((LinearMap.toMatrix altRightBasis altRightBasis) (altRightHanded.ρ M)) (i, j) k)
+        * altRightAltRightToMatrix v k.1 k.2) = _
+  erw [Finset.sum_product]
+  simp_rw [kroneckerMap_apply, Matrix.mul_apply, Matrix.transpose_apply]
+  have h1 : ∑ x : Fin 2, (∑ x1 : Fin 2, (↑M)⁻¹ᴴ i x1 * altRightAltRightToMatrix v x1 x) * (↑M)⁻¹ᴴ j x
+    = ∑ x : Fin 2, ∑ x1 : Fin 2, ((↑M)⁻¹ᴴ i x1 * altRightAltRightToMatrix v x1 x) * (↑M)⁻¹ᴴ j x := by
+    congr
+    funext x
+    rw [Finset.sum_mul]
+  erw [h1]
+  rw [Finset.sum_comm]
+  congr
+  funext x
+  congr
+  funext x1
+  simp only [altRightBasis_ρ_apply, transpose_apply, Action.instMonoidalCategory_tensorObj_V]
+  ring
+
+/-- The group action of `SL(2,ℂ)` on `rightHanded ⊗ altRightHanded` is equivalent to
+  `(M.1.map star) * rightAltRightToMatrix v * (((M.1⁻¹).conjTranspose)ᵀ`. -/
+lemma rightAltRightToMatrix_ρ (v : (rightHanded ⊗ altRightHanded).V) (M : SL(2,ℂ)) :
+    rightAltRightToMatrix (TensorProduct.map (rightHanded.ρ M) (altRightHanded.ρ M) v) =
+    (M.1.map star) * rightAltRightToMatrix v * (((M.1⁻¹).conjTranspose)ᵀ) := by
+  nth_rewrite 1 [rightAltRightToMatrix]
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.trans_apply]
+  trans (LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)) ((LinearMap.toMatrix
+      (rightBasis.tensorProduct altRightBasis) (rightBasis.tensorProduct altRightBasis)
+      (TensorProduct.map (rightHanded.ρ M) (altRightHanded.ρ M)))
+      *ᵥ ((Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2))
+      ((rightBasis.tensorProduct altRightBasis).repr (v))))
+  · apply congrArg
+    have h1 := (LinearMap.toMatrix_mulVec_repr (rightBasis.tensorProduct altRightBasis)
+       (rightBasis.tensorProduct altRightBasis)
+       (TensorProduct.map (rightHanded.ρ M) (altRightHanded.ρ M)) v)
+    erw [h1]
+    rfl
+  rw [TensorProduct.toMatrix_map]
+  funext i j
+  change ∑ k, ((kroneckerMap (fun x1 x2 => x1 * x2)
+        ((LinearMap.toMatrix rightBasis rightBasis) (rightHanded.ρ M))
+        ((LinearMap.toMatrix altRightBasis altRightBasis) (altRightHanded.ρ M)) (i, j) k)
+        * rightAltRightToMatrix v k.1 k.2) = _
+  erw [Finset.sum_product]
+  simp_rw [kroneckerMap_apply, Matrix.mul_apply, Matrix.transpose_apply]
+  have h1 : ∑ x : Fin 2, (∑ x1 : Fin 2, (M.1.map star) i x1 * rightAltRightToMatrix v x1 x) * (↑M)⁻¹ᴴ j x
+    = ∑ x : Fin 2, ∑ x1 : Fin 2, ((M.1.map star) i x1 * rightAltRightToMatrix v x1 x) * (↑M)⁻¹ᴴ j x := by
+    congr
+    funext x
+    rw [Finset.sum_mul]
+  erw [h1]
+  rw [Finset.sum_comm]
+  congr
+  funext x
+  congr
+  funext x1
+  simp only [rightBasis_ρ_apply, altRightBasis_ρ_apply, transpose_apply,
+    Action.instMonoidalCategory_tensorObj_V]
+  ring
+
+/-- The group action of `SL(2,ℂ)` on `altRightHanded ⊗ rightHanded` is equivalent to
+  `((M.1⁻¹).conjTranspose * rightAltRightToMatrix v * ((M.1.map star)).ᵀ`. -/
+lemma altRightRightToMatrix_ρ (v : (altRightHanded ⊗ rightHanded).V) (M : SL(2,ℂ)) :
+    altRightRightToMatrix (TensorProduct.map (altRightHanded.ρ M) (rightHanded.ρ M) v) =
+    ((M.1⁻¹).conjTranspose) * altRightRightToMatrix v * (M.1.map star)ᵀ := by
+  nth_rewrite 1 [altRightRightToMatrix]
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.trans_apply]
+  trans (LinearEquiv.curry ℂ ℂ (Fin 2) (Fin 2)) ((LinearMap.toMatrix
+      (altRightBasis.tensorProduct rightBasis) (altRightBasis.tensorProduct rightBasis)
+      (TensorProduct.map (altRightHanded.ρ M) (rightHanded.ρ M)))
+      *ᵥ ((Finsupp.linearEquivFunOnFinite ℂ ℂ (Fin 2 × Fin 2))
+      ((altRightBasis.tensorProduct rightBasis).repr (v))))
+  · apply congrArg
+    have h1 := (LinearMap.toMatrix_mulVec_repr (altRightBasis.tensorProduct rightBasis)
+       (altRightBasis.tensorProduct rightBasis)
+       (TensorProduct.map (altRightHanded.ρ M) (rightHanded.ρ M)) v)
+    erw [h1]
+    rfl
+  rw [TensorProduct.toMatrix_map]
+  funext i j
+  change ∑ k, ((kroneckerMap (fun x1 x2 => x1 * x2)
+        ((LinearMap.toMatrix altRightBasis altRightBasis) (altRightHanded.ρ M))
+        ((LinearMap.toMatrix rightBasis rightBasis) (rightHanded.ρ M)) (i, j) k)
+        * altRightRightToMatrix v k.1 k.2) = _
+  erw [Finset.sum_product]
+  simp_rw [kroneckerMap_apply, Matrix.mul_apply, Matrix.transpose_apply]
+  have h1 : ∑ x : Fin 2, (∑ x1 : Fin 2, (↑M)⁻¹ᴴ i x1 * altRightRightToMatrix v x1 x) * (M.1.map star) j x
+    = ∑ x : Fin 2, ∑ x1 : Fin 2, ((↑M)⁻¹ᴴ i x1 * altRightRightToMatrix v x1 x) * (M.1.map star) j x := by
+    congr
+    funext x
+    rw [Finset.sum_mul]
+  erw [h1]
+  rw [Finset.sum_comm]
+  congr
+  funext x
+  congr
+  funext x1
+  simp only [altRightBasis_ρ_apply, rightBasis_ρ_apply, transpose_apply,
+    Action.instMonoidalCategory_tensorObj_V]
+  ring
+
+/-!
+
+## The symm version of the group actions.
+
+-/
+
+lemma leftLeftToMatrix_ρ_symm (v : Matrix (Fin 2) (Fin 2) ℂ) (M : SL(2,ℂ)) :
+    TensorProduct.map (leftHanded.ρ M) (leftHanded.ρ M) (leftLeftToMatrix.symm v) =
+    leftLeftToMatrix.symm (M.1 * v * (M.1)ᵀ) := by
+  have h1 := leftLeftToMatrix_ρ (leftLeftToMatrix.symm v) M
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.apply_symm_apply] at h1
+  rw [← h1]
+  simp
+
+lemma altLeftaltLeftToMatrix_ρ_symm (v : Matrix (Fin 2) (Fin 2) ℂ) (M : SL(2,ℂ)) :
+    TensorProduct.map (altLeftHanded.ρ M) (altLeftHanded.ρ M) (altLeftaltLeftToMatrix.symm v) =
+    altLeftaltLeftToMatrix.symm ((M.1⁻¹)ᵀ * v * (M.1⁻¹)) := by
+  have h1 := altLeftaltLeftToMatrix_ρ (altLeftaltLeftToMatrix.symm v) M
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.apply_symm_apply] at h1
+  rw [← h1]
+  simp
+
+lemma leftAltLeftToMatrix_ρ_symm (v : Matrix (Fin 2) (Fin 2) ℂ) (M : SL(2,ℂ)) :
+    TensorProduct.map (leftHanded.ρ M) (altLeftHanded.ρ M) (leftAltLeftToMatrix.symm v) =
+    leftAltLeftToMatrix.symm (M.1 * v * (M.1⁻¹)) := by
+  have h1 := leftAltLeftToMatrix_ρ (leftAltLeftToMatrix.symm v) M
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.apply_symm_apply] at h1
+  rw [← h1]
+  simp
+
+lemma altLeftLeftToMatrix_ρ_symm (v : Matrix (Fin 2) (Fin 2) ℂ) (M : SL(2,ℂ)) :
+    TensorProduct.map (altLeftHanded.ρ M) (leftHanded.ρ M) (altLeftLeftToMatrix.symm v) =
+    altLeftLeftToMatrix.symm ((M.1⁻¹)ᵀ * v * (M.1)ᵀ) := by
+  have h1 := altLeftLeftToMatrix_ρ (altLeftLeftToMatrix.symm v) M
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.apply_symm_apply] at h1
+  rw [← h1]
+  simp
+
+lemma rightRightToMatrix_ρ_symm (v : Matrix (Fin 2) (Fin 2) ℂ) (M : SL(2,ℂ)) :
+    TensorProduct.map (rightHanded.ρ M) (rightHanded.ρ M) (rightRightToMatrix.symm v) =
+    rightRightToMatrix.symm ((M.1.map star) * v * ((M.1.map star))ᵀ) := by
+  have h1 := rightRightToMatrix_ρ (rightRightToMatrix.symm v) M
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.apply_symm_apply] at h1
+  rw [← h1]
+  simp
+
+lemma altRightAltRightToMatrix_ρ_symm (v : Matrix (Fin 2) (Fin 2) ℂ) (M : SL(2,ℂ)) :
+    TensorProduct.map (altRightHanded.ρ M) (altRightHanded.ρ M) (altRightAltRightToMatrix.symm v) =
+    altRightAltRightToMatrix.symm (((M.1⁻¹).conjTranspose) * v * ((M.1⁻¹).conjTranspose)ᵀ) := by
+  have h1 := altRightAltRightToMatrix_ρ (altRightAltRightToMatrix.symm v) M
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.apply_symm_apply] at h1
+  rw [← h1]
+  simp
+
+lemma rightAltRightToMatrix_ρ_symm (v : Matrix (Fin 2) (Fin 2) ℂ) (M : SL(2,ℂ)) :
+    TensorProduct.map (rightHanded.ρ M) (altRightHanded.ρ M) (rightAltRightToMatrix.symm v) =
+    rightAltRightToMatrix.symm ((M.1.map star) * v * (((M.1⁻¹).conjTranspose)ᵀ) ) := by
+  have h1 := rightAltRightToMatrix_ρ (rightAltRightToMatrix.symm v) M
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.apply_symm_apply] at h1
+  rw [← h1]
+  simp
+
+lemma altRightRightToMatrix_ρ_symm (v : Matrix (Fin 2) (Fin 2) ℂ) (M : SL(2,ℂ)) :
+    TensorProduct.map (altRightHanded.ρ M) (rightHanded.ρ M) (altRightRightToMatrix.symm v) =
+    altRightRightToMatrix.symm (((M.1⁻¹).conjTranspose) * v * (M.1.map star)ᵀ) := by
+  have h1 := altRightRightToMatrix_ρ (altRightRightToMatrix.symm v) M
+  simp only [Action.instMonoidalCategory_tensorObj_V, LinearEquiv.apply_symm_apply] at h1
+  rw [← h1]
+  simp
+
+
+
+end
+end Fermion

HepLean/SpaceTime/WeylFermion/Unit.lean

@@ -0,0 +1,159 @@
+/-
+Copyright (c) 2024 Joseph Tooby-Smith. All rights reserved.
+Released under Apache 2.0 license as described in the file LICENSE.
+Authors: Joseph Tooby-Smith
+-/
+import HepLean.SpaceTime.WeylFermion.Basic
+import HepLean.SpaceTime.WeylFermion.Contraction
+import Mathlib.LinearAlgebra.TensorProduct.Matrix
+import HepLean.SpaceTime.WeylFermion.Two
+/-!
+
+# Units of Weyl fermions
+
+We define the units for Weyl fermions, often denoted `δ` in the literature.
+
+-/
+
+namespace Fermion
+noncomputable section
+
+open Matrix
+open MatrixGroups
+open Complex
+open TensorProduct
+open CategoryTheory.MonoidalCategory
+
+/-- The left-alt-left unit `δₐᵃ` as an element of `(leftHanded ⊗ altLeftHanded).V`. -/
+def leftAltLeftUnitVal : (leftHanded ⊗ altLeftHanded).V :=
+  leftAltLeftToMatrix.symm 1
+
+/-- The left-alt-left unit `δₐᵃ` as a morphism `𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ leftHanded ⊗ altLeftHanded `,
+  manifesting the invariance under the `SL(2,ℂ)` action. -/
+def leftAltLeftUnit : 𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ leftHanded ⊗ altLeftHanded where
+  hom := {
+    toFun := fun a =>
+      let a' : ℂ := a
+      a' • leftAltLeftUnitVal,
+    map_add' := fun x y => by
+      simp only [add_smul]
+    map_smul' := fun m x => by
+      simp only [smul_smul]
+      rfl}
+  comm M := by
+    ext x : 2
+    simp
+    let x' : ℂ := x
+    change x' • leftAltLeftUnitVal =
+      (TensorProduct.map (leftHanded.ρ M) (altLeftHanded.ρ M)) (x' • leftAltLeftUnitVal)
+    simp
+    apply congrArg
+    simp [leftAltLeftUnitVal]
+    erw [leftAltLeftToMatrix_ρ_symm]
+    apply congrArg
+    simp
+
+/-- The alt-left-left unit `δᵃₐ` as an element of `(altLeftHanded ⊗ leftHanded).V`. -/
+def altLeftLeftUnitVal : (altLeftHanded ⊗ leftHanded).V :=
+  altLeftLeftToMatrix.symm 1
+
+/-- The alt-left-left unit `δᵃₐ` as a morphism `𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ altLeftHanded ⊗ leftHanded `,
+  manifesting the invariance under the `SL(2,ℂ)` action. -/
+def altLeftLeftUnit : 𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ altLeftHanded ⊗ leftHanded where
+  hom := {
+    toFun := fun a =>
+      let a' : ℂ := a
+      a' • altLeftLeftUnitVal,
+    map_add' := fun x y => by
+      simp only [add_smul]
+    map_smul' := fun m x => by
+      simp only [smul_smul]
+      rfl}
+  comm M := by
+    ext x : 2
+    simp
+    let x' : ℂ := x
+    change x' • altLeftLeftUnitVal =
+      (TensorProduct.map (altLeftHanded.ρ M) (leftHanded.ρ M)) (x' • altLeftLeftUnitVal)
+    simp
+    apply congrArg
+    simp [altLeftLeftUnitVal]
+    erw [altLeftLeftToMatrix_ρ_symm]
+    apply congrArg
+    simp only [mul_one, ← transpose_mul, SpecialLinearGroup.det_coe, isUnit_iff_ne_zero, ne_eq,
+      one_ne_zero, not_false_eq_true, mul_nonsing_inv, transpose_one]
+
+/-- The right-alt-right unit `δ_{dot a}^{dot a}` as an element of
+  `(rightHanded ⊗ altRightHanded).V`. -/
+def rightAltRightUnitVal : (rightHanded ⊗ altRightHanded).V :=
+  rightAltRightToMatrix.symm 1
+
+/-- The right-alt-right unit `δ_{dot a}^{dot a}` as a morphism
+  `𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ rightHanded ⊗ altRightHanded`, manifesting
+  the invariance under the `SL(2,ℂ)` action. -/
+def rightAltRightUnit : 𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ rightHanded ⊗ altRightHanded where
+  hom := {
+    toFun := fun a =>
+      let a' : ℂ := a
+      a' • rightAltRightUnitVal,
+    map_add' := fun x y => by
+      simp only [add_smul]
+    map_smul' := fun m x => by
+      simp only [smul_smul]
+      rfl}
+  comm M := by
+    ext x : 2
+    simp
+    let x' : ℂ := x
+    change x' • rightAltRightUnitVal =
+      (TensorProduct.map (rightHanded.ρ M) (altRightHanded.ρ M)) (x' • rightAltRightUnitVal)
+    simp
+    apply congrArg
+    simp [rightAltRightUnitVal]
+    erw [rightAltRightToMatrix_ρ_symm]
+    apply congrArg
+    simp
+    symm
+    refine transpose_eq_one.mp ?h.h.h.a
+    simp
+    change  (M.1)⁻¹ᴴ * (M.1)ᴴ = 1
+    rw [@conjTranspose_nonsing_inv]
+    simp
+
+/-- The alt-right-right unit `δ^{dot a}_{dot a}` as an element of
+  `(rightHanded ⊗ altRightHanded).V`. -/
+def altRightRightUnitVal : (altRightHanded ⊗ rightHanded).V :=
+  altRightRightToMatrix.symm 1
+
+/-- The alt-right-right unit `δ^{dot a}_{dot a}` as a morphism
+  `𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ altRightHanded ⊗ rightHanded`, manifesting
+  the invariance under the `SL(2,ℂ)` action. -/
+def altRightRightUnit : 𝟙_ (Rep ℂ SL(2,ℂ)) ⟶ altRightHanded ⊗ rightHanded where
+  hom := {
+    toFun := fun a =>
+      let a' : ℂ := a
+      a' • altRightRightUnitVal,
+    map_add' := fun x y => by
+      simp only [add_smul]
+    map_smul' := fun m x => by
+      simp only [smul_smul]
+      rfl}
+  comm M := by
+    ext x : 2
+    simp
+    let x' : ℂ := x
+    change x' • altRightRightUnitVal =
+      (TensorProduct.map (altRightHanded.ρ M) (rightHanded.ρ M)) (x' • altRightRightUnitVal)
+    simp
+    apply congrArg
+    simp [altRightRightUnitVal]
+    erw [altRightRightToMatrix_ρ_symm]
+    apply congrArg
+    simp
+    symm
+    change  (M.1)⁻¹ᴴ * (M.1)ᴴ = 1
+    rw [@conjTranspose_nonsing_inv]
+    simp
+
+end
+end Fermion

HepLean/Tensors/OverColor/Iso.lean

@@ -52,6 +52,11 @@ def fin2Iso {c : Fin 2 → C} : mk c ≅ mk ![c 0] ⊗ mk ![c 1] :=by
     fin_cases x
     rfl
 
+def finSwapTwo {n : ℕ} (i : Fin n) : Fin (2 + n) ≃ Fin n.succ.succ := by
+  let e1 := Equiv.swap (Fin.castAdd n (0 : Fin 2)) (Fin.natAdd 2 i)
+  let e2 := Equiv.swap (Fin.castAdd n (1 : Fin 2)) (Fin.natAdd 2 i)
+
+
 /-- The equivalence between `Fin n.succ` and `Fin 1 ⊕ Fin n` extracting the
   `i`th component. -/
 def finExtractOne {n : ℕ} (i : Fin n.succ) : Fin n.succ ≃ Fin 1 ⊕ Fin n :=