Modular symmetry at level 6 and a new route towards finite modular groups

Abstract

We propose to construct the finite modular groups from the quotient of two principal congruence subgroups as (N')/(N"), and the modular group SL(2,Z) is extended to a principal congruence subgroup (N'). The original modular invariant theory is reproduced when N'=1. We perform a comprehensive study of '6 modular symmetry corresponding to N'=1 and N"=6, five types of models for lepton masses and mixing with '6 modular symmetry are discussed and some example models are studied numerically. The case of N'=2 and N"=6 is considered, the finite modular group is (2)/(6) T', and a benchmark model is constructed.