A dichotomy theorem for -switchable H-colouring on m-edge coloured graphs

Abstract

Let G be a graph in which each edge is assigned one of the colours 1, 2, …, m, and let be a subgroup of Sm. The operation of switching at a vertex x of G with respect to an element π of permutes the colours of the edges incident with x according to π. We investigate the complexity of whether there exists a sequence of switches that transforms a given m-edge coloured graph G so that it has a colour-preserving homomorphism to a fixed m-edge coloured graph H and give a dichotomy theorem in the case that acts transitively.