New Bounds for Edge-Cover by Random Walk

Published 29 Sep 2011 in math.CO and cs.DM | (1109.6619v1)

Abstract: We show that the expected time for a random walk on a (multi-)graph $G$ to traverse all $m$ edges of $G$, and return to its starting point, is at most $2m^2$; if each edge must be traversed in both directions, the bound is $3m^2$. Both bounds are tight and may be applied to graphs with arbitrary edge lengths, with implications for Brownian motion on a finite or infinite network of total edge-length $m$.

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