Well-hued graphs with first difference two
Abstract
A graph G is said to be well-hued if every maximal k-colorable subgraph of G has the same order ak. Therefore, if G is well-hued, we can associate with G a sequence \ak\. Necessary and sufficient conditions were given as to when a sequence \ak\ is realized by a well-hued graph. Further, it was conjectured there is only one connected well-hued graph with a2 = a1 + 2 for every a1 4. In this paper, we prove this conjecture as well as characterize nearly all well-hued graphs with a1=2. We also investigate when both G and its complement are well-hued.
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