A Recolouring Version of a Conjecture of Reed
Abstract
Reed conjectured that the chromatic number of any graph is closer to its clique number than to its maximum degree plus one. We consider a recolouring version of this conjecture, with respect to Kempe changes. Namely, we investigate the largest such that all graphs G are k-recolourable for all k ω(G) + (1 -)((G)+1) . For general graphs, an existing construction of a frozen colouring shows that 1/3. We show that this construction is optimal in the sense that there are no frozen colourings below that threshold. For this reason, we conjecture that = 1/3. For triangle-free graphs, we give a construction of frozen colourings that shows that 4/9, and prove that it is also optimal. In the special case of odd-hole-free graphs, we show that = 1/2, and that this is tight up to one colour.
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