Dynamics of confined Levy flights in terms of (Levy) semigroups

Abstract

The master equation for a probability density function (pdf) driven by L\'evy noise, if conditioned to conform with the principle of detailed balance, admits a transformation to a contractive strongly continuous semigroup dynamics. Given a priori a functional form of the semigroup potential, we address the ground-state reconstruction problem for generic L\'evy-stable semigroups, for all values of the stability index μ ∈ (0,2). That is known to resolve an invariant pdf for confined L\'evy flights (e.g. the former jump-type process). Jeopardies of the procedure are discussed, with a focus on: (i) when an invariant pdf actually is an asymptotic one, (ii) subtleties of the pdf μ -dependence in the vicinity and sharply at the boundaries 0 and 2 of the stability interval, where jump-type scenarios cease to be valid.