Strengthening a theorem of Meyniel

Abstract

For an integer k ≥ 1 and a graph G, let Kk(G) be the graph that has vertex set all proper k-colorings of G, and an edge between two vertices α and~β whenever the coloring~β can be obtained from α by a single Kempe change. A theorem of Meyniel from 1978 states that K5(G) is connected with diameter O(5|V(G)|) for every planar graph G. We significantly strengthen this result, by showing that there is a positive constant c such that K5(G) has diameter O(|V(G)|c) for every planar graph G.