Kempe Classes and Almost Bipartite Graphs

Abstract

Let G be a graph and k be a positive integer, and let Kc(G, k) denote the number of Kempe equivalence classes for the k-colorings of G. In 2006, Mohar noted that Kc(G, k) = 1 if G is bipartite. As a generalization, we show that Kc(G, k) = 1 if G is formed from a bipartite graph by adding any number of edges less than k/22+ k/22. We show that our result is tight (up to lower order terms) by constructing, for each k ≥ 8, a graph G formed from a bipartite graph by adding (k2+8k-45+1)/4 edges such that Kc(G, k) ≥ 2. This refutes a recent conjecture of Higashitani--Matsumoto.