Crossings states and sets of states in P\'olya random walks

Abstract

We consider the P\'olya random walk in Z2. The paper establishes a number of results for the distributions and expectations of the number of usual (undirected) and specifically defined in the paper up- and down-directed state-crossings and different sets of states crossings. One of the most important results of this paper is that the expected number of undirected state-crossings n is equal to 1 for any state n∈Z2\0\. As well, the results of the paper are extended to d-dimensional random walks, d≥2, in bounded areas.