Achromatic arboricity on complete graphs
Abstract
In this paper we study the achromatic arboricity of the complete graph. This parameter arises from the arboricity of a graph as the achromatic index arises from the chromatic index. The achromatic arboricity of a graph G, denoted by Aα(G), is the maximum number of colors that can be used to color the edges of G such that every color class induces a forest but any two color classes contain a cycle. In particular, if G is a complete graph we prove that \[14n32-(n) ≤ Aα(G)≤ 12n32-(n).\]
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