A step toward Chen-Lih-Wu conjecture
Abstract
An equitable k-coloring of a graph is a proper k-coloring where the sizes of any two different color classes differ by at most one. In 1973, Meyer conjectured that every connected graph G has an equitable k-coloring for some k≤ (G), unless G is a complete graph or an odd cycle. Chen, Lih, and Wu strengthened this in 1994 by conjecturing that for k≥ 3, the only connected graphs of maximum degree at most k with no equitable k-coloring are the complete bipartite graph Kk,k for odd k and the complete graph Kk+1. A more refined conjecture was proposed by Kierstead and Kostochka, relaxing the maximum degree condition to an Ore-type condition. Their conjecture states the following: for k≥ 3, if G is an n-vertex graph such that d(x) + d(y)≤ 2k for every edge xy∈ E(G), and G admits no equitable k-coloring, then G contains either Kk+1 or Km,2k-m for some odd m. We prove that for any constant c>0 and all sufficiently large n, the latter two conjectures hold for every k≥ cn. Our proof yields an algorithm with polynomial time that decides whether G has an equitable k-coloring, thereby answering a conjecture of Kierstead, Kostochka, Mydlarz, and Szemer\'edi when k cn.
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