On the (parameterized) complexity of recognizing well-covered (r,l)-graphs

Abstract

An (r, )-partition of a graph G is a partition of its vertex set into r independent sets and cliques. A graph is (r, ) if it admits an (r, )-partition. A graph is well-covered if every maximal independent set is also maximum. A graph is (r,)-well-covered if it is both (r,) and well-covered. In this paper we consider two different decision problems. In the (r,)-Well-Covered Graph problem ((r,)WCG for short), we are given a graph G, and the question is whether G is an (r,)-well-covered graph. In the Well-Covered (r,)-Graph problem (WC(r,)G for short), we are given an (r,)-graph G together with an (r,)-partition of V(G) into r independent sets and cliques, and the question is whether G is well-covered. We classify most of these problems into P, coNP-complete, NP-complete, NP-hard, or coNP-hard. Only the cases WC(r,0)G for r≥ 3 remain open. In addition, we consider the parameterized complexity of these problems for several choices of parameters, such as the size α of a maximum independent set of the input graph, its neighborhood diversity, its clique-width, or the number of cliques in an (r, )-partition. In particular, we show that the parameterized problem of deciding whether a general graph is well-covered parameterized by α can be reduced to the WC(0,)G problem parameterized by . In addition, we prove that both problems are coW[2]-hard but can be solved in XP-time.