Two flavor neutrino oscillations in presence of non-Hermitian dynamics

Abstract

We develop a consistent mathematical framework for studying two flavor neutrino oscillations in presence of non-Hermitian dynamics. We consider two approaches : (a) bi-orthonormal inner product defined by a positive-definite metric operator G and (b) the density matrix prescription by Brody and Graefe [Phys. Rev. Lett. 109, 230405 (2012)]. For the PT-symmetric case, we show that the G metric approach does not work well (probabilities are not conserved) both in PT-unbroken as well as PT-broken regime. Hence, we adopt the density matrix prescription by Brody and Graefe which is a positive semi-definite map. In the density matrix prescription, we note that probability in the steady state limit is not necessarily 1/2 thereby indicating non-Markovian behavior.