Octahedral Symmetry with Geometrical Breaking: New Prediction for Neutrino Mixing Angle theta13 and CP Violation

Abstract

We propose octahedral group Oh as the family symmetry of neutrino-lepton sector. We find that Oh contains subgroups Z2(mu-tau) x Z2(solar) and Z4l for realizing the bimaximal (BM) mixings, theta23 = theta12 = 45o and theta13=0o, where Z2(mu-tau) x Z2(solar) and Z4l serve as the residual symmetries of neutrinos and charged leptons, respectively. We present geometric interpretations of BM mixing in the octahedron, and construct natural geometrical breaking of Z4l, leading to nontrivial deviations from the BM mixings. Our theory makes truly simple predictions of a relatively large reactor angle, theta13 = 45o - theta12 = 7.5o - 13.7o (3 sigma), the nearly maximal atmospheric angle and the approximate maximal Dirac CP violation. These agree well with the current neutrino data, and will be further probed by the on-going and upcoming oscillation experiments.