Symmetric formulation of neutrino oscillations in matter and its intrinsic connection to renormalization-group equations

Abstract

In this article, we point out that the effective Hamiltonian for neutrino oscillations in matter is invariant under the transformation of the mixing angle θ12 θ12 - π/2 and the exchange of first two neutrino masses m1 m2, if the standard parametrization of lepton flavor mixing matrix is adopted. To maintain this symmetry in perturbative calculations, we present a symmetric formulation of the effective Hamiltonian by introducing an η-gauge neutrino mass-squared difference * η 31 + (1-η)32 for 0 ≤ η ≤ 1, where ji m2j - m2i for ji = 21, 31, 32, and show that only η = 1/2, η = 2θ12 or η = 2 θ12 is allowed. Furthermore, we prove that η = 2 θ12 is the best choice to derive more accurate and compact neutrino oscillation probabilities, by implementing the approach of renromalization-group equations. The validity of this approach becomes transparent when an analogy is made between the parameter η herein and the renormalization scale μ in relativistic quantum field theories.