Implications of the Zero 1-3 Flavour Mixing Hypothesis: Predictions for $\theta_{23}^\mathrm{PMNS}$ and $\delta^\mathrm{PMNS}$

TL;DR

This paper explores the implications of the zero 1-3 flavour mixing hypothesis for lepton and quark mixing angles and CP phases, deriving predictions within GUT models and analyzing current experimental constraints.

Contribution

It derives exact mixing sum rule relations under the zero 1-3 mixing assumption and predicts $ heta_{23}^ ext{PMNS}$ and CP phases in GUT frameworks.

Findings

Predictions for $ heta_{23}^ ext{PMNS}$ based on current $ heta_{13}^ ext{PMNS}$ data.

A novel lepton phase sum rule under small charged lepton mixing.

CP phases $ ext{delta}^ ext{CKM}$ and $ ext{delta}^ ext{PMNS}$ can be linked to a single imaginary element in mass matrices.

Abstract

We revisit mixing sum rule relations in the lepton and quark sectors under the assumption that the 1-3 elements of the flavour mixing matrices ($V^u_L,V^d_L,V^e_L,V^\nu_L$) are zero in the flavour basis. We consider the exact relations resulting from the validity of this "zero 1-3 flavour mixing hypothesis" and analyse their implications based on the current experimental data, including effects from RG running. In particular, we analyse how the existing precise measurement of $\theta_{13}^\mathrm{PMNS}$ allows to derive predictions for $\theta_{23}^\mathrm{PMNS}$ in models with constrained $\theta_{12}^\mathrm{e}$. As examples, we calculate the predictions for $\theta_{23}^\mathrm{PMNS}$ which arise in classes of Pati-Salam models and SU(5) GUTs that relate $\theta_{12}^\mathrm{e}$ to $\theta_{12}^\mathrm{d}$. We also derive a novel "lepton phase sum rule", valid under the additional assumption of small charged lepton mixing contributions. We furthermore point out that, in the context of GUT flavour models, the quark and lepton CP violating phases $\delta^\mathrm{CKM}$ and $\delta^\mathrm{PMNS}$ can both be predicted from a single imaginary element in the mass matrices.