One-factorizations of complete multipartite graphs with distance constraints

Abstract

The present paper considers multipartite graphs from the perspective of design theory and coding theory. A one-factor F of the complete multipartite graph Kn× g (with n parts of size g) gives rise to a (g+1)-ary code C of length n and constant weight two. Furthermore, if the one-factor F meets a certain constraint, then C becomes an optimal code with minimum distance three. We initiate the study of one-factorizations of complete multipartite graphs subject to distance constraints. The problem of decomposing Kn× g into the largest subgraphs with minimum distance three is investigated. It is proved that, for n g, the complete multipartite graph Kn× g can be decomposed into g2 copies of the largest subgraphs with minimum distance three. For even gn with n>g, it is proved that the complete multipartite graph Kn× g can be decomposed into g(n-1) one-factors with minimum distance three, leaving a small gap of n (in terms of g) to be resolved (If gn is odd when n>g, no such decomposition of Kn× g exists).