Geometric representation of CP phases δ PDG, δ KM in flavor mixing matrix and its sum rule by alternative unitarity triangle and quadrangle

Abstract

In this letter, we present a geometric representation of the CP phases δ PDG and δ KM in the PDG and Kobayashi--Maskawa parameterizations of the flavor mixing matrix in the complex plane. The sum rule with the unitarity triangle δ PDG + δ KM = π - α + γ is expressed as a quadrangle, which is a combination of a unitarity triangle and an alternative triangle. Through the unitarity quadrangle, the CP phases are also identified with specific geometric angles. Furthermore, a new set of inverse unitarity triangles is defined from the inversion formula of a unitary matrix U = U-1. These novel triangles contain standard angles of the form [Uα i Uβ j Uα j* Uβ i*] and new angles [Uα i Uβ j Uγ k / U], which directly determine nontrivial arguments of the mixing matrix elements.