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WG
2007
Springer

Mixing 3-Colourings in Bipartite Graphs

14 years 5 months ago
Mixing 3-Colourings in Bipartite Graphs
For a 3-colourable graph G, the 3-colour graph of G, denoted C3(G), is the graph with node set the proper vertex 3-colourings of G, and two nodes adjacent whenever the corresponding colourings differ on precisely one vertex of G. We consider the following question : given G, how easily can we decide whether or not C3(G) is connected? We show that the 3-colour graph of a 3-chromatic graph is never connected, and characterise the bipartite graphs for which C3(G) is connected. We also show that the problem of deciding the connectedness of the 3-colour graph of a bipartite graph is coNP-complete, but that restricted to planar bipartite graphs, the question is answerable in polynomial time.
Luis Cereceda, Jan van den Heuvel, Matthew Johnson
Added 09 Jun 2010
Updated 09 Jun 2010
Type Conference
Year 2007
Where WG
Authors Luis Cereceda, Jan van den Heuvel, Matthew Johnson
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