Rephasing invariant structure of CP phase for simplified mixing matrices in Fritzsch--Xing parametrization

Abstract

In this paper, we construct an explicit rephasing transformation that converts an arbitrary unitary mixing matrix into the Fritzsch--Xing (FX) parametrization, which is obtained by trivializing arguments of the matrix elements in the third row and third column. We further analyze rephasing invariant structure of the FX phase δ FX under an approximation U13e = 0, where the 1-3 element of the diagonalization matrix of charged leptons Ue is neglected. With an additional approximation U23e = 0, the FX phase becomes highly simplified, reducing to a sum of the neutrino-intrinsic FX phase δν FX and the contribution from the relative phase ρ'1- ρ'2 between the lighter 1-2 generations. The phase δ FX for finite U23e is understood as a generalization of the compact expression. This result covers almost all perturbative calculations of CP phases for the CKM and MNS matrices with hierarchical charged fermions.