Positive Lyapunov exponent for random perturbations of predominantly expanding multimodal circle maps

Abstract

We study the effects of IID random perturbations of amplitude ε > 0 on the asymptotic dynamics of one-parameter families \fa : S1 S1, a ∈ [0,1]\ of smooth multimodal maps which "predominantly expanding", i.e., |f'a| 1 away from small neighborhoods of the critical set \ f'a = 0 \. We obtain, for any ε > 0, a checkable, finite-time criterion on the parameter a for random perturbations of the map fa to exhibit (i) a unique stationary measure, and (ii) a positive Lyapunov exponent comparable to ∫S1 |fa'| \, dx. This stands in contrast with the situation for the deterministic dynamics of fa, the chaotic regimes of which are determined by typically uncheckable, infinite-time conditions. Moreover, our finite-time criterion depends on only k (ε-1) iterates of the deterministic dynamics of fa, which grows quite slowly as ε 0.