Common origin of \theta_{13} and \Delta m^2_{12} in a model of neutrino mass with quaternion symmetry

TL;DR

This paper proposes a neutrino mass model with quaternion symmetry that links the smallness of the mixing angle θ13 to the mass-squared difference ratio Δm^2_12/Δm^2_23, predicting specific ranges for θ13 based on mass ordering.

Contribution

It introduces the quaternion group Q as a family symmetry to explain the correlation between θ13 and neutrino mass differences, providing testable predictions.

Findings

Predicts 0.12 ≤ sinθ13 ≤ 0.2 for normal hierarchy

Predicts sinθ13 ≤ 0.12 for inverted hierarchy

Establishes conditions for neutrino mass degeneracy and CP phase vanishing

Abstract

The smallness of the 1-3 lepton mixing angle $\theta_{13}$ and of the neutrino mass-squared-difference ratio $\Delta m^2_{12}/\Delta m^2_{23}$ can be understood as the departure from a common limit where they both vanish. We discuss in general the conditions for realizing the mass degeneracy of a pair of neutrinos and show that the vanishing of a CP violating phase is needed. We find that the discrete quaternion group Q of eight elements is the simplest family symmetry which correlates the smallness of $\Delta m^2_{12}$ to the value of $\theta_{13}$. In such a model we predict $0.12\lesssim \sin\theta_{13} \lesssim 0.2$ if the ordering of the neutrino mass spectrum is normal, and $\sin\theta_{13}\lesssim 0.12$ if it is inverted.