Raising The Bar For Vertex Cover: Fixed-parameter Tractability Above A Higher Guarantee

Abstract

We investigate the following above-guarantee parameterization of the classical Vertex Cover problem: Given a graph G and k∈N as input, does G have a vertex cover of size at most (2LP-MM)+k? Here MM is the size of a maximum matching of G, LP is the value of an optimum solution to the relaxed (standard) LP for Vertex Cover on G, and k is the parameter. Since (2LP-MM)≥LP≥MM, this is a stricter parameterization than those---namely, above-MM, and above-LP---which have been studied so far. We prove that Vertex Cover is fixed-parameter tractable for this stricter parameter k: We derive an algorithm which solves Vertex Cover in time O*(3k), pushing the envelope further on the parameterized tractability of Vertex Cover.