Harmonic polynomials and other exactly computable characteristics for 2-dimensional random walks in cones

Abstract

In this note we consider 2-dimensional lattice random walks killed at leaving a wedge with opening α∈(0,π]. Assuming that the walk cannot jump over the boundary of the wedge we prove that there exists a harmonic polynomial if and only if α=π/m with some integer m. Our proof is constructive and allows one to give exact expressions for harmonic polynomials for every integer m. Furthermore, we give exact expressions for all finite moments of the exit time, this result is valid for all angles α.