On Polynomial Kernelization of H-free Edge Deletion

Abstract

For a set of graphs H, the H-free Edge Deletion problem asks to find whether there exist at most k edges in the input graph whose deletion results in a graph without any induced copy of H∈H. In cai1996fixed, it is shown that the problem is fixed-parameter tractable if H is of finite cardinality. However, it is proved in cai2013incompressibility that if H is a singleton set containing H, for a large class of H, there exists no polynomial kernel unless coNP⊂eq NP/poly. In this paper, we present a polynomial kernel for this problem for any fixed finite set H of connected graphs and when the input graphs are of bounded degree. We note that there are H-free Edge Deletion problems which remain NP-complete even for the bounded degree input graphs, for example Triangle-free Edge Deletionbrugmann2009generating and Custer Edge Deletion(P3-free Edge Deletion)komusiewicz2011alternative. When H contains K1,s, we obtain a stronger result - a polynomial kernel for Kt-free input graphs (for any fixed t> 2). We note that for s>9, there is an incompressibility result for K1,s-free Edge Deletion for general graphs cai2012polynomial. Our result provides first polynomial kernels for Claw-free Edge Deletion and Line Edge Deletion for Kt-free input graphs which are NP-complete even for K4-free graphsyannakakis1981edge and were raised as open problems in cai2013incompressibility,open2013worker.