报告摘要:
| For positive integerskandr, an (k;r)-coloring of a graphGis a properk-coloring of the vertices such that every vertex of degreeiwill be adjacent to vertices with at least min{i,r} different colors. The smallest integerkfor which a graph has an (k; r)-coloring is ther-hued chromatic numberΧr(G). It is known that there exist families ofgraphs in which the difference betweenΧr(G) and the classic chromatic number tends to infinity. It has been one of the main research stream problems to identify graph families in which In this the difference betweenΧr(G) and the classic chromatic number is bounded. We investigate the 3-hued chromatic number of claw-free graphs and give out its best possible upper bound.
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