C2k+1-coloring of bounded-diameter graphs

Abstract

For a fixed graph H, in the graph homomorphism problem, denoted by Hom(H), we are given a graph G and we have to determine whether there exists an edge-preserving mapping : V(G) V(H). Note that Hom(C3), where C3 is the cycle of length 3, is equivalent to 3-Coloring. The question whether 3-Coloring is polynomial-time solvable on diameter-2 graphs is a well-known open problem. In this paper we study the Hom(C2k+1) problem on bounded-diameter graphs for k≥ 2, so we consider all other odd cycles than C3. We prove that for k≥ 2, the Hom(C2k+1) problem is polynomial-time solvable on diameter-(k+1) graphs -- note that such a result for k=1 would be precisely a polynomial-time algorithm for 3-Coloring of diameter-2 graphs. Furthermore, we give subexponential-time algorithms for diameter-(k+2) graphs. We complement these results with a lower bound for diameter-(2k+2) graphs -- in this class of graphs the Hom(C2k+1) problem is NP-hard and cannot be solved in subexponential-time, unless the ETH fails. Finally, we consider another direction of generalizing 3-Coloring on diameter-2 graphs. We consider other target graphs H than odd cycles but we restrict ourselves to diameter 2. We show that if H is triangle-free, then Hom(H) is polynomial-time solvable on diameter-2 graphs.