A Brightwell-Winkler type characterisation of NU graphs

Abstract

In 2000, Brightwell and Winkler characterised dismantlable graphs as the graphs H for which the Hom-graph Hom(G,H), defined on the set of homomorphisms from G to H, is connected for all graphs G. This shows that the reconfiguration version ReconHom(H) of the H-colouring problem, in which one must decide for a given G whether Hom(G,H) is connected, is trivial if and only if H is dismantlable. We prove a similar starting point for the reconfiguration version of the H-extension problem. Where Hom(G,H;p) is the subgraph of the Hom-graph Hom(G,H) induced by the H-colourings extending the H-precolouring p of G, the reconfiguration version ReconExt(H) of the H-extension problem asks, for a given H-precolouring p of a graph G, if Hom(G,H;p) is connected. We show that the graphs H for which Hom(G,H;p) is connected for every choice of (G,p) are exactly the NU graphs. This gives a new characterisation of NU graphs, a nice class of graphs that is important in the algebraic approach to the CSP-dichotomy. We further give bounds on the diameter of Hom(G,H;p) for NU graphs H, and show that shortest path between two vertices of Hom(G,H;p) can be found in parameterised polynomial time. We apply our results to the problem of shortest path reconfiguration, significantly extending recent results.