Sharp Bounds and Precise Values for the Ni-Chromatic Number of Graphs
Abstract
Let G be a connected undirected graph.~A vertex coloring f of G is an Ni-vertex coloring if for each vertex x in G, the number of different colors assigned to NG(x) is at most i.~The Ni-chromatic number of G, denoted by ti(G), is the maximum number of colors which are used in an Ni-vertex coloring of G. In this paper, we provide sharp bounds for ti(G) of a graph G in terms of its vertex cover number, maximum degree and diameter, respectively. We also determine precise values for ti(G) in some cases.
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