Switching (m, n)-mixed graphs with respect to Abelian groups

Abstract

We extend results of Brewster and Graves for switching m-edge coloured graphs with respect to a cyclic group to switching (m, n)-mixed graphs with respect to an Abelian group. In particular, we establish the existence of a (m, n)-mixed graph P(H) with the property that a (m, n)-mixed graph G is switch equivalent to H if and only if it is a special subgraph of P(H), and the property that that G can be switched to have a homomorphism to H if and only if it has a homomorphism (without switching) to P(H). We consider the question of deciding whether a (m, n)-mixed graph can be switched so that it has a homomorphism to a proper subgraph, i.e. whether it can be switched so that it isn't a core. We show that this question is NP-hard for arbitrary groups and NP-complete for Abelian groups. Finally, we consider the complexity of the switchable k-colouring problem for (m, n)-mixed graphs and prove a dichotomy theorem in the cases where m ≥ 1.

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