Non-Abelian Discrete Symmetries in Particle Physics

Abstract

We review pedagogically non-Abelian discrete groups, which play an important role in the particle physics. We show group-theoretical aspects for many concrete groups, such as representations, their tensor products. We explain how to derive, conjugacy classes, characters, representations, and tensor products for these groups (with a finite number). We discussed them explicitly for SN, AN, T', DN, QN, (2N2), (3N2), T7, (3N3) and (6N2), which have been applied for model building in the particle physics. We also present typical flavor models by using A4, S4, and (54) groups. Breaking patterns of discrete groups and decompositions of multiplets are important for applications of the non-Abelian discrete symmetry. We discuss these breaking patterns of the non-Abelian discrete group, which are a powerful tool for model buildings. We also review briefly about anomalies of non-Abelian discrete symmetries by using the path integral approach.