New rephasing invariants and CP violation built from the trios of the CKM or PMNS matrix elements

Abstract

Given the 3× 3 Cabibbo-Kobayashi-Maskawa (CKM) quark flavor mixing matrix V, we define a new set of rephasing invariants in terms of the "trios" of its nine elements: ijkαβγ (Vα i Vβ j Vγ k)/ V with α ≠ β ≠ γ and i ≠ j ≠ k running respectively over (u, c, t) and (d, s, b). We find that Im ijkαβγ = - J holds, where J is the well-known Jarlskog invariant of weak CP violation. Analogous rephasing invariants ijkαβγ (Uα I Uβ j Uγ k)/ U can be defined for the 3× 3 Pontecorvo-Maki-Nakagawa-Sakata (PMNS) lepton flavor mixing matrix U, where α ≠ β ≠ γ and i ≠ j ≠ k run respectively over (e, μ, τ) and (1, 2, 3). Taking into account small non-unitarity of U based on the canonical seesaw mechanism for neutrino mass generation, we calculate Im ijkαβγ with the help of a full Euler-like block parametrization of the seesaw flavor structure and demonstrate that their leading terms converge to a universal invariant J in the unitarity limit of U.