Analytical solutions to renormalization-group equations of effective neutrino masses and mixing parameters in matter

Abstract

Recently, a complete set of differential equations for the effective neutrino masses and mixing parameters in matter have been derived to characterize their evolution with respect to the ordinary matter term a 22G F Ne E, in analogy with the renormalization-group equations (RGEs) for running parameters. Via series expansion in terms of the small ratio α c 21/ c, we obtain approximate analytical solutions to the RGEs of the effective neutrino parameters and make several interesting observations. First, at the leading order, θ12 and θ13 are given by the simple formulas in the two-flavor mixing limit, while θ23 ≈ θ23 and δ ≈ δ are not changed by matter effects. Second, the ratio of the matter-corrected Jarlskog invariant J to its counterpart in vacuum J approximates to J/ J ≈ 1/(C12 C13), where C12 1 - 2 A* 2θ12 + A2* with A* a/21 and C13 1 - 2 A c 2θ13 + A2 c with A c a/ c. Finally, after taking higher-order corrections into account, we find compact and simple expressions of all the effective parameters.