Rephasing invariant formulae for CP phases in general parameterizations of flavor mixing matrix and exact sum rules with unitarity triangles

Abstract

In this letter, we present rephasing invariant formulae δ(α i) = [ Vα 1 Vα 2 Vα 3 V1i V2i V3i / Vα i 3 V ] for CP phases δ(α i) associated with nine Euler-angle-like parameterizations of a flavor mixing matrix. Here, α and i denote the row and column carrying the trivial phases in a given parameterization. Furthermore, we show that the phases δ(α i) and the nine angles α i of unitarity triangles satisfy compact sum rules δ(α, i+2) - δ(α, i+1) = α-2, i - α-1, i and δ(α-2, i) - δ(α-1, i) = α, i+2 - α, i+1 where all indices are taken cyclically modulo three. These twelve relations are natural generalizations of the previous result δPDG+δKM=π-α+γ.