Connected equitably -colorable realizations with k-factors

Abstract

A graph G is said to be equitably c-colorable if its vertices can be partitioned into c independent sets that pairwise differ in size by at most one. Chen, Lih, and Wu conjectured that every connected graph G with maximum degree (G)≥ 2 has an equitable coloring with (G) colors, except when G is complete, an odd cycle, or a balanced bipartite graph with odd sized partitions. Suppose G is a connected graph with a k-factor (a regular spanning subgraph) F such that G is not complete, a 1-factor, nor an odd cycle. When k≥ 1 we demonstrate that there is a connected (k-1) edge-connected equitably (G)-colorable graph H with a k-factor F' such that G-E(F)=H-E(F'). If we drop the requirement that G-E(F)=H-E(F'), then we can say more. Considering the non-increasing degree sequence π=(d1,…, dn) of G where di=degG(vi) for all vertices \v1,…,vn\ of G, we call m(π)=\i|di≥ i\ the strong index of π. For k≥ 0, we can show that for every c≥ l≤ m(π)\dl+l2\+1 we can find a connected (k-1) edge-connected equitably c-colorable realization H of π that has a k-factor. In a third theorem we show that if dd1-dn+1≥ d1-dn+k-1, then some realization of π has a k-factor. Together, these three theorems allow us to prove that for all k, there is a connected equitably (G)-colorable realization H of π with a k-factor. Thus, giving support to the validity of the Chen-Lih-Wu Conjecture.

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