Odd Cycle Transversal in Pk-Free Graphs

Abstract

The Odd Cycle Transversal (OCT) problem, which asks for a minimum subset of vertices whose removal renders a graph bipartite, is a central problem in algorithmic graph theory. It is known to be NP-complete even on Pk-free graphs for k 6. Furthermore, assuming the Unique Games Conjecture (UGC), OCT does not admit a constant-factor approximation algorithm on general graphs. Motivated by these hardness results, we investigate the approximability of OCT on Pk-free graphs. We first establish that the problem becomes polynomial-time solvable on specific subclasses of Pk-free graphs, most notably (P6, C3)-free graphs, by exploiting a structural decomposition into rings of bipartite graphs. Leveraging these tractable substructures as a basis, we present a constant-factor approximation algorithm for OCT on general Pk-free graphs. We achieve an approximation ratio of k-2 when k is odd and k-3 when k is even. These results provide the first nontrivial constant-factor approximations for this class dependent on k, aligning with the UGC implication that no approximation factor independent of k is likely to exist.