Recurrence and transience criteria for two cases of stable-like Markov chains

Abstract

We give recurrence and transience criteria for two cases of time-homogeneous Markov chains on the real line with transition kernel p(x,dy)=fx(y-x)dy, where fx(y) are probability densities of symmetric distributions and, for large |y|, have a power-law decay with exponent α(x)+1, with α(x)∈(0,2). If fx(y) is the density of a symmetric α-stable distribution for negative x and the density of a symmetric β-stable distribution for non-negative x, where α,β∈(0,2), then the chain is recurrent if and only if α+β≥2. If the function x fx is periodic and if the set \x:α(x)=α0:=∈fx∈α(x)\ has positive Lebesgue measure, then, under a uniformity condition on the densities fx(y) and some mild technical conditions, the chain is recurrent if and only if α0≥1.