Asymptotically stable random walks of index 1<α<2 killed on a finite set

Abstract

For a random walk on the integer lattice Z that is attracted to a strictly stable process with index α∈ (1, 2) we obtain the asymptotic form of the transition probability for the walk killed when it hits a finite set. The asymptotic forms obtained are valid uniformly in a natural range of the space and time variables. The situation is relatively simple when the limit stable process has jumps in both positive and negative directions; in the other case when the jumps are one sided rather interesting matters are involved and detailed analyses are necessitated.