A non-backtracking Polya's theorem
Combinatorics
2016-10-18 v1
Abstract
P\'olya's random walk theorem states that a random walk on a -dimensional grid is recurrent for and transient for . We prove a version of P\'olya's random walk theorem for non-backtracking random walks. Namely, we prove that a non-backtracking random walk on a -dimensional grid is recurrent for and transient for , . Along the way, we prove several useful general facts about non-backtracking random walks on graphs. In addition, our proof includes an exact enumeration of the number of closed non-backtracking random walks on an infinite 2-dimensional grid. This enumeration suggests an interesting combinatorial link between non-backtracking random walks on grids, and trinomial coefficients.
Cite
@article{arxiv.1610.04672,
title = {A non-backtracking Polya's theorem},
author = {Mark Kempton},
journal= {arXiv preprint arXiv:1610.04672},
year = {2016}
}