Coloring graphs with two odd cycle lengths
Abstract
In this paper we determine the chromatic number of graphs with two odd cycle lengths. Let G be a graph and L(G) be the set of all odd cycle lengths of G. We prove that: (1) If L(G)=\3,3+2l\, where l≥ 2, then (G)=\3,ω(G)\; (2) If L(G)=\k,k+2l\, where k≥ 5 and l≥ 1, then (G)=3. These, together with the case L(G)=\3,5\ solved in W, give a complete solution to the general problem addressed in W,CS,KRS. Our results also improve a classical theorem of Gy\'arf\'as which asserts that (G) 2|L(G)|+2 for any graph G.
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