Leaves for packings with block size four

Abstract

We consider maximum packings of edge-disjoint 4-cliques in the complete graph Kn. When n 1 or 4 12, these are simply block designs. In other congruence classes, there are necessarily uncovered edges; we examine the possible `leave' graphs induced by those edges. We give particular emphasis to the case n 0 or 3 12, when the leave is 2-regular. Colbourn and Ling settled the case of Hamiltonian leaves in this case. We extend their construction and use several additional direct and recursive constructions to realize a variety of 2-regular leaves. For various subsets S ⊂eq \3,4,5,…\, we establish explicit lower bounds on n to guarantee the existence of maximum packings with any possible leave whose cycle lengths belong to S.