Abstract
We consider continuous time random walks on a product
graph G×H, where G is arbitrary
and H consists of two vertices x and y
linked by an edge. For any t>0 and any
a, b∈V(G),
we show that the random walk starting at (a, x)
is more likely to have hit (b, x) than (b, y)
by time t. This contrasts with the discrete time case and
proves a conjecture of Bollobás
and Brightwell. We also generalize the result to cases where H
is either a complete graph on n vertices or a cycle on n
vertices.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,Computational Theory and Mathematics,Statistics and Probability,Theoretical Computer Science
Cited by
3 articles.
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