Large Deviations Principle for a Large Class of One-Dimensional Markov Processes

Abstract

We study the large deviations principle for one dimensional, continuous, homogeneous, strong Markov processes that do not necessarily behave locally as a Wiener process. Any strong Markov process Xt in R that is continuous with probability one, under some minimal regularity conditions, is governed by a generalized elliptic operator DvDu, where v and u are two strictly increasing functions, v is right continuous and u is continuous. In this paper, we study large deviations principle for Markov processes whose infinitesimal generator is ε DvDu where 0<ε 1. This result generalizes the classical large deviations results for a large class of one dimensional "classical" stochastic processes. Moreover, we consider reaction-diffusion equations governed by a generalized operator DvDu. We apply our results to the problem of wave front propagation for these type of reaction-diffusion equations.