Chiral perturbative reconstruction of the complex orthogonal matrix R in Casas--Ibarra parameterization

Abstract

In this letter, we perform a chiral perturbative analysis by singular values mDi of the Dirac mass matrix mD for the type-I seesaw mechanism. In the basis where mD = V mD diag U is diagonal, the mass matrix of right-handed neutrinos MR is written by MR = mD diag m-1 mD diag. If the mass matrix of light neutrinos m has an inverse matrix and the singular values mDi are hierarchical (mD1 mD2 mD3), the singular values Mi and diagonalization matrix U of MR are obtained perturbatively. By treating mDi and V as input parameters, mD is represented in the basis where MR is diagonal, and we perturbatively derive the orthogonal matrix R in Casas--Ibarra parameterization. As a result, R is independent of mDi in the leading order, and it is reconstructed as an orthonormal basis Ri1 mi / m11 (U MNST V*)i1 \, , Ri2 εijk Rj3 Rk1 \, , Ri3 (U MNS V)i3 / mi (m-1)33 . Here, mi is the masses of light neutrinos and denotes the independent degree of freedom for each column vector.