Towards Cereceda's conjecture for planar graphs
Abstract
The reconfiguration graph Rk(G) of the k-colourings of a graph G has as vertex set the set of all possible k-colourings of G and two colourings are adjacent if they differ on the colour of exactly one vertex. Cereceda conjectured ten years ago that, for every k-degenerate graph G on n vertices, Rk+2(G) has diameter O(n2). The conjecture is wide open, with a best known bound of O(kn), even for planar graphs. We improve this bound for planar graphs to 2O(n). Our proof can be transformed into an algorithm that runs in 2O(n) time.
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