Weak convergence of random walks conditioned to stay away

Abstract

Let \Xn\n∈N be a sequence of i.i.d. random variables in Zd. Let Sk=X1+...+Xk and Yn(t) be the continuous process on [0,1] for which Yn(k/n)=Sk/n k=1,...,n and which is linearly interpolated elsewhere. The paper gives a generalization of results of Belkin, B72 on the weak limit laws of Yn(t) conditioned to stay away from some small sets. In particular, it is shown that the diffusive limit of the random walk meander on Zd: d 2 is the Brownian motion.