Flavor symmetries from modular subgroups in magnetized compactifications

Abstract

We study the flavor structures of zero-modes, which are originated from the modular symmetry on T21× T22 and its orbifold with magnetic fluxes. We introduce the constraint on the moduli parameters by τ2=Nτ1, where τi denotes the complex structure moduli on T2i. Such a constraint can be derived from the moduli stabilization. The modular symmetry of T21 × T22 is SL(2,Z)τ1 × SL(2,Z)τ2 ⊂ Sp(4,Z) and it is broken to 0(N) × 0(N) by the moduli constraint. The wave functions represent their covering groups. We obtain various flavor groups in these models.