DIRECTED STAR DECOMPOSITIONS OF THE COMPLETE DIRECTED GRAPH

An (s, t)-directed star is a directed graph with s + t + 1 vertices and s + t arcs; s vertices have indegree zero and outdegree one, t have indegree one and outdegree zero, and one has indegree s and outdegree t. An (s, t)-directed star decomposition is a partition of the arcs of a complete directed graph of order n into (s, t)-directed stars. We establish necessary and sufficient conditions on s, t, and n for an (s, t)-directed star decomposition of order n to exist.