On Escaping, Entering, and Visiting Discs of Projections of Planar Symmetric Random Walks on the Lattice Torus

Abstract

We examine escape and entrance times, Green's functions, local times, and hitting distributions of discs and annuli of a symmetric random walk on 2 projected onto the periodic lattice 2K. This extends a framework for the simple planar random walk in Dembo, et al. (2006) to the large class of planar random walks in Bass, Rosen (2007). The approach uses comparisons between 2 and 2K hitting times and distributions on annuli, and uses only random walk methods.