An Overshoot Approach to Recurrence and Transience of Markov Processes

Abstract

We develop criteria for recurrence and transience of one-dimensional Markov processes which have jumps and oscillate between +∞ and -∞. The conditions are based on a Markov chain which only consists of jumps (overshoots) of the process into complementary parts of the state space. In particular we show that a stable-like process with generator -(-)α(x)/2 such that α(x)=α for x<-R and α(x)=β for x>R for some R>0 and α,β∈(0,2) is transient if and only if α+β<2, otherwise it is recurrent. As a special case this yields a new proof for the recurrence, point recurrence and transience of symmetric α-stable processes.