5-Coloring Reconfiguration of Planar Graphs with No Short Odd Cycles

Abstract

The coloring reconfiguration graph Ck(G) has as its vertex set all the proper k-colorings of G, and two vertices in Ck(G) are adjacent if their corresponding k-colorings differ on a single vertex. Cereceda conjectured that if an n-vertex graph G is d-degenerate and k≥ d+2, then the diameter of Ck(G) is O(n2). Bousquet and Heinrich proved that if G is planar and bipartite, then the diameter of C5(G) is O(n2). (This proves Cereceda's Conjecture for every such graph with degeneracy 3.) They also highlighted the particular case of Cereceda's Conjecture when G is planar and has no 3-cycles. As a partial solution to this problem, we show that the diameter of C5(G) is O(n2) for every planar graph G with no 3-cycles and no 5-cycles.