Residual Z2 symmetries and leptonic mixing patterns from finite discrete subgroups of U(3)

Abstract

We study embedding of non-commuting Z2 and Zm, m≥ 3 symmetries in discrete subgroups (DSG) of U(3) and analytically work out the mixing patterns implied by the assumption that Z2 and Zm describe the residual symmetries of the neutrino and the charged lepton mass matrices respectively. Both Z2 and Zm are assumed to be subgroups of a larger discrete symmetry group Gf possessing three dimensional faithful irreducible representation. The residual symmetries predict the magnitude of a column of the leptonic mixing matrix U PMNS which are studied here assuming Gf as the DSG of SU(3) designated as type C and D and large number of DSG of U(3) which are not in SU(3). These include the known group series (3n3), Tn(m), (3n2,m), (6n2,m) and '(6n2,j,k). It is shown that the predictions for a column of |U PMNS| in these group series and the C and D types of groups are all contained in the predictions of the (6N2) groups for some integer N. The (6N2) groups therefore represent a sufficient set of Gf to obtain predictions of the residual symmetries Z2 and Zm.