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paper

Covariant Extremisation of Flavour-Symmetric Jarlskog Invariants and the Neutrino Mixing Matrix

arXiv:hep-ph/0508012 · doi:10.1016/j.physletb.2005.09.009

Abstract

We examine the possibility that the form of the lepton mixing matrix can be determined by extremising the Jarlskog flavour invariants associated, eg. with the commutator ($C$) of the lepton mass matrices. Introducing a strictly covariant approach, keeping masses fixed and extremising the determinant (Tr $C^3/3$) leads to maximal CP violation, while extremising the sum of the $2 \times 2$ principal minors ($-{\rm Tr} C^2/2$), leads to a non-trivial mixing with zero CP violation. Extremising, by way of example, a general linear combination of two CP-symmetric invariants together, we show that our procedures can lead to acceptable mixings and to non-trivial predictions, eg.\ $|U_{e3}| \simeq \sqrt{2}/3 \sqrt{Δm_{12}^2/Δm_{23}^2} (1-m_μ/m_τ)^2 \simeq 0.07$.

20 pages latex, no figures. Version-2 includes m->m^2 results, removes Appendix on K-matrix, adds more refs