Metastability of Morse-Smale dynamical systems perturbed by heavy-tailed L\'evy type noise

Abstract

We consider a general class of finite dimensional deterministic dynamical systems with finitely many local attractors Ki each of which supports a unique ergodic probability measure Pi, which includes in particular the class of Morse-Smale systems in any finite dimension. The dynamical system is perturbed by a multiplicative non-Gaussian heavy-tailed L\'evy type noise of small amplitude >0. Specifically we consider perturbations leading to a It\o, Stratonovich and canonical (Marcus) stochastic differential equation. The respective asymptotic first exit time and location problem from each of the domains of attractions Di in case of inward pointing vector fields in the limit of 0 was solved by the authors in [J. Stoch. An. Appl. 32(1), 163-190, 2014]. We extend these results to domains with characteristic boundaries and show that the perturbed system exhibits a metastable behavior in the sense that there exits a unique -dependent time scale on which the random system converges to a continuous time Markov chain switching between the invariant measures Pi. As examples we consider α-stable perturbations of the Duffing equation and a chemical system exhibiting a birhythmic behavior.