Residual Diffusivity for Expanding Bernoulli Maps
Abstract
Consider a discrete time Markov process Xε on Rd that makes a deterministic jump based on its current location, and then takes a small Gaussian step of variance ε2. We study the behavior of the asymptotic variance as ε 0. In some situations (for instance if there were no jumps), then the asymptotic variance vanishes as ε 0. When the jumps are "chaotic", however, the asymptotic variance may be bounded from above and bounded away from 0, as ε 0. This phenomenon is known as residual diffusivity, and we prove this occurs when the jumps are determined by certain expanding Bernoulli maps.
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