Levy targeting and the principle of detailed balance

Abstract

We investigate confined L\'evy flights under premises of the principle of detailed balance. The master equation admits a transformation to L\'evy - Schr\"odinger semigroup dynamics (akin to a mapping of the Fokker-Planck equation into the generalized diffusion equation). We solve a stochastic targeting problem for arbitrary stability index 0<μ <2 of L\'evy drivers: given an invariant probability density function (pdf), specify the jump - type dynamics for which this pdf is a long-time asymptotic target. Our ("μ-targeting") method is exemplified by Cauchy family and Gaussian target pdfs. We solve the reverse engineering problem for so-called L\'evy oscillators: given a quadratic semigroup potential, find an asymptotic pdf for the associated master equation for arbitrary μ.