Normal and Special Models of Neutrino Masses and Mixings

TL;DR

This paper distinguishes between 'normal' and 'special' neutrino mass models, focusing on a recent special model using A4 symmetry and extra dimensions that naturally produces the Harrison-Perkins-Scott mixing matrix.

Contribution

It introduces a detailed classification of neutrino mass models and presents a novel special model based on A4 symmetry and extra dimensions.

Findings

Normal models are simpler and more economical.

Special models can naturally explain near-zero $ heta_{13}$ and specific mixing patterns.

The A4-based model predicts the Harrison-Perkins-Scott mixing matrix.

Abstract

One can make a distinction between "normal" and "special" models. For normal models $\theta_{23}$ is not too close to maximal and $\theta_{13}$ is not too small, typically a small power of the self-suggesting order parameter $\sqrt{r}$, with $r=\Delta m_{sol}^2/\Delta m_{atm}^2 \sim 1/35$. Special models are those where some symmetry or dynamical feature assures in a natural way the near vanishing of $\theta_{13}$ and/or of $\theta_{23}- \pi/4$. Normal models are conceptually more economical and much simpler to construct. Here we focus on special models, in particular a recent one based on A4 discrete symmetry and extra dimensions that leads in a natural way to a Harrison-Perkins-Scott mixing matrix.