SU(3) L (Z3 × Z3) gauge symmetry and Tri-bimaximal mixing

Abstract

We study an effective gauge theory whose gauge group is a semidirect product G = Gc with Gc and being a connected Lie group and a finite group, respectively. The semidirect product is defined through a projective homomorphism γ (i.e., homomorphism up to the center of Gc) from into Gc. The (linear) representation of G is made from γ and a projective representation of over C. To be specific, we take SU(3)L as Gc and Z3 × Z3 as . It is noticed that the irreducible projective representations of are three-dimensional in spite of its Abelian nature. We give a toy model on the lepton mixing which illustrates the peculiar feature of such gauge symmetry. It is shown that under a particular vacuum alignment the tri-bimaximal mixing matrix is reproduced.