Cops and robber in graphs with bounded vertex cover number
Abstract
Meyniel's conjecture states that n-vertex connected graphs have cop number O(n). The current best known upper bound is n/2(1-o(1)) n, proved independently by Lu and Peng (2011), and by Scott and Sudakov (2011). In this paper, we extend their result by showing that every connected graph with vertex cover number k has cop number at most k/2(1-o(1)) k. This is the first sublinear upper bound on the cop number in terms of the vertex cover number.
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