Decomposition of a complete bipartite multigraph into arbitrary cycle sizes

Abstract

In a graph G, let μG(xy) denote the number of edges between x and y in G. Let λ Kv,u be the graph (V U,E) with |V|=v, |U|=u, and \[ μG(xy)=cases λ &if x∈ U and y∈ V or if x∈ V and y∈ U\\ 0 &otherwise. \\ cases \] Let M be a sequence of non-negative integers m1,m2,…,mn. An (M)-cycle decomposition of a graph G is a partition of the edge set into cycles of lengths m1,m2,…,mn. In this paper, we establish necessary and sufficient conditions for the existence of an (M)-cycle decomposition of λ Kv,u.