Nontrivial Flavor Structure from Noncompact Lie Group in Noncommutative Geometry

Abstract

In this paper, we propose a mechanism which induces nontrivial flavor structure from transformations of a noncompact Lie group SL(3,C) in noncommutative geometry. Matrices L ∈ SL(3,C) are associated with accompanied by the preon fields as aL,R (x) LL,R aL,R (x). In order to retain the Hermiticity of the Lagrangian, we assume the same trick when is replaced by to construct a Lorentz invariant Lagrangian. As a result, the Dirac Lagrangian has both of flavor-universal gauge interactions and nontrivial Yukawa interactions. Removing the unphysical unitary transformations, Yukawa matrices found to be Yij = LL k LR L UL k UR R. Here, k is a coefficient, U is 3 × 3 unitary matrix and is the eigenvalue matrix = diag(λ1, λ2, λ3) with λ1λ2λ3 = 1. If LL,R are originated from a broken symmetry, the hierarchy and mixing of flavor can be interpreted as the "Lorentz boost" and the "rotation" in this space respectively.