Subdivisions in the Robber Locating Game
Abstract
We consider a game in which a cop searches for a moving robber on a graph using distance probes, which is a slight variation on one introduced by Seager. Carragher, Choi, Delcourt, Erickson and West showed that for any n-vertex graph there is a winning strategy for the cop on the graph obtained by replacing each edge of by a path of length , if . They conjectured that this bound was best possible for complete graphs, but the present authors showed that in fact the cop wins on if and only if , for all but a few small values of . In this paper we extend this result to general graphs by proving that the cop has a winning strategy on provided for all but a few small values of ; this bound is best possible. We also consider replacing the edges of with paths of varying lengths.
Cite
@article{arxiv.1509.04701,
title = {Subdivisions in the Robber Locating Game},
author = {John Haslegrave and Richard A. B. Johnson and Sebastian Koch},
journal= {arXiv preprint arXiv:1509.04701},
year = {2020}
}
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13 Pages