Random walk on the quadrant

We consider the random walk of a particle along topologically linear channels under the influence of a uniform drift force. The channels are generated by the usual biased random walk procedure. The resulting mean-and mean-square displacements of a particle are discussed.

This paper looks at random regular simple graphs and considers nearest neighbor random walks on such graphs. This paper considers walks where the degree d of each vertex is around (logn)", where a is a constant which is at least 2 and where n is the number of vertices. By extending techniques of Dou

The classical gambler's ruin problem, i.e., a random walk along a line may be viewed q raph theoretically as a random walk along a path with the endpoints as absorbing states. This paper is an i0vestigation of the natural generalization of this problem to that of a particle walking randomly on a tre