On the Complexity of the Circular Chromatic Number
Abstract
Circular chromatic number, c is a natural generalization of chromatic number. It is known that it is -hard to determine whether or not an arbitrary graph G satisfies (G) = c(G). In this paper we prove that this problem is -hard even if the chromatic number of the graph is known. This answers a question of Xuding Zhu. Also we prove that for all positive integers k 2 and n 3, for a given graph G with (G)=n, it is -complete to verify if c(G) n- 1k.
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