Algebraic realisation of three fermion generations with S3 family and unbroken gauge symmetry from C(8)

Abstract

Building on previous work, we extend an algebraic realisation of three fermion generations within the complex Clifford algebra C(8) by incorporating a U(1)em gauge symmetry. The algebra C(8) corresponds to the algebra of complex linear maps from the (complexification of the) Cayley-Dickson algebra of sedenions, S, to itself. Previous work represented three generations of fermions with SU(3)C colour symmetry permuted by an S3 symmetry of order-three, but failed to include a U(1) generator that assigns the correct electric charge to all states. Furthermore, the three generations suffered from a degree of linear dependence between states. By generalising the embedding of the discrete group S3, corresponding to automorphisms of S, into C(8), we include an S3-invariant U(1) that correctly assigns electric charge. First-generation states are represented in terms of two even C(8) semi-spinors, obtained from two minimal left ideals, related to each other via the order-two S3 symmetry. The remaining two generations are obtained by applying the S3 symmetry of order-three to the first generation. In this model, the gauge symmetries, SU(3)C× U(1)em, are S3-invariant and preserve the semi-spinors. As a result of the generalised embedding of the S3 automorphisms of S into C(8), the three generations are now linearly independent.