Redicoloring some classes of circulant tournaments
Abstract
Given a digraph D with no loops, the dicoloring graph of D, denoted by Dk(D), is the graph whose vertices are the acyclic k-colorings of D and two colorings are adjacent in Dk(D) if they differ in color on exactly one vertex. In this paper, we prove that there is no expression φ() in terms of the dichromatic number , such that the graph Dk(D) is connected for all graphs D and integers k≥ φ(). We give conditions for the dicoloring graph of two infinite families of circulant tournaments to be connected, and we provide upper bounds for its diameter. In particular, for the Payley tournament C7(1,2,4), also known as ST7, we prove that Dk(C7(1,2,4)) is connected and has diameter 8, for each k≥ 3.
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