English

An algebraic-combinatorial framework for finding the average hitting times in graphs with high regularity

Combinatorics 2026-05-13 v1

Abstract

For any given vertices uu and vv in a graph, the hitting time of a random walk on a finite graph is the number of steps it takes for a random walk to reach vertex vv starting at vertex uu. The expected value of the hitting time is the average hitting time. In this paper, we present an algebraic-combinatorial method for calculating the average hitting time between vertices of finite graphs exhibiting high regularity, along with its applications to multiple graph classes. Our approach exploits a novel connection between maximal-entropy random walks and weight-equitable partitions, providing a unifying framework that strengthens and extends several known results, including Rao's method [Statistics \& Probability Letters, 2013] for computing the hitting time from a vertex to a neighbor under certain symmetries of the starting vertex.

Keywords

Cite

@article{arxiv.2605.11812,
  title  = {An algebraic-combinatorial framework for finding the average hitting times in graphs with high regularity},
  author = {Aida Abiad and Yusaku Nishimura},
  journal= {arXiv preprint arXiv:2605.11812},
  year   = {2026}
}