Cyclic hamiltonian cycle systems of the complete multipartite graph: even number of parts

Abstract

A hamiltonian cycle system (HCS, for short) of a graph is a partition of the edges of into hamiltonian cycles. A HCS is cyclic when it is invariant under a cyclic permutation of all the vertices of ; the existence problem for a cyclic HCS has been completely solved by Buratti and Del Fra in 2004 when is the complete graph Kv, v odd, and by Jordon and Morris in 2008 when is the complete graph minus a 1-factor Kv-I, v even. In this work we present a complete solution to the existence problem of a cyclic HCS for = Km× n, the complete multipartite graph, when the number of parts m is even. We also give necessary and sufficient conditions for the existence of a cyclic and symmetric HCS of ; the notion of a symmetric HCS of a graph has been introduced in 2004 by Akiyama, Kobayashi, and Nakamura for =Kv, v odd, in 2011 by Brualdi and Schroeder when = Kv-I, v even, and, very recently, by Schroeder when is the complete multipartite graph.