Finding large k-colorable induced subgraphs in (bull, chair)-free and (bull,E)-free graphs

Abstract

We study the Max Partial k-Coloring problem, where we are given a vertex-weighted graph, and we ask for a maximum-weight induced subgraph that admits a proper k-coloring. For k=1 this problem coincides with Maximum Weight Independent Set, and for k=2 the problem is equivalent (by complementation) to Minimum Odd Cycle Transversal. Furthermore, it generalizes k-Coloring. We show that Max Partial k-Coloring on n-vertex instances with clique number ω can be solved in time * nO(kω) if the input graph excludes the bull and the chair as an induced subgraph, * nO(kω n) if the input graph excludes the bull and E as an induced subgraph. This implies that k-Coloring can be solved in polynomial time in the former class, and in quasipolynomial-time in the latter one.

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