Kernelization for Partial Vertex Cover via (Additive) Expansion Lemma

Abstract

Given a graph and two integers k and , Partial Vertex Cover asks for a set of at most k vertices whose deletion results in a graph with at most edges. Based on the expansion lemma, we provide a problem kernel with ( + 2)(k + ) vertices. We then introduce a new, additive version of the expansion lemma and show it can be used to prove a kernel with ( + 1)(k + ) vertices for 1.

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