An algorithmic weakening of the Erdos-Hajnal conjecture

Abstract

We study the approximability of the Maximum Independent Set (MIS) problem in H-free graphs (that is, graphs which do not admit H as an induced subgraph). As one motivation we investigate the following conjecture: for every fixed graph H, there exists a constant δ > 0 such that MIS can be n1 - δ-approximated in H-free graphs, where n denotes the number of vertices of the input graph. We first prove that a constructive version of the celebrated Erdos-Hajnal conjecture implies ours. We then prove that the set of graphs H satisfying our conjecture is closed under the so-called graph substitution. This, together with the known polynomial-time algorithms for MIS in H-free graphs (e.g. P6-free and fork-free graphs), implies that our conjecture holds for many graphs H for which the Erdos-Hajnal conjecture is still open. We then focus on improving the constant δ for some graph classes: we prove that the classical Local Search algorithm provides an OPT1-1t-approximation in Kt,t-free graphs (hence a OPT-approximation in C4-free graphs), and, while there is a simple n-approximation in triangle-free graphs, it cannot be improved to n14- for any > 0 unless NP ⊂eq BPP. More generally, we show that there is a constant c such that MIS in graphs of girth γ cannot be ncγ-approximated. Up to a constant factor in the exponent, this matches the ratio of a known approximation algorithm by Monien and Speckenmeyer, and by Murphy. To the best of our knowledge, this is the first strong (i.e., (nδ) for some δ > 0) inapproximability result for Maximum Independent Set in a proper hereditary class.