The sandwich problem for odd-hole-free and even-hole-free graphs

Abstract

For a property P of graphs, the P-Sandwich-Problem, introduced by Golumbic and Shamir (1993), is the following: Given a pair of graphs (G1, G2) on the same vertex set V, does there exist a graph G such that V(G)=V, E(G1)⊂eq E(G) ⊂eq E(G2), and G satisfies P? A hole in a graph is an induced subgraph which is a cycle of length at least four. An odd (respectively even) hole is a hole of odd (respectively even) length. Given a class of graphs C and a graph G we say that G is C-free if it contains no induced subgraph isomorphic to a member of C. In this paper we prove that if P is the property of being odd-hole-free or the property of being even-hole-free, then the P-Sandwich-Problem is NP-hard.

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