Cyclic triangle factors in regular tournaments

Abstract

Both Cuckler and Yuster independently conjectured that when n is an odd positive multiple of 3 every regular tournament on n vertices contains a collection of n/3 vertex-disjoint copies of the cyclic triangle. Soon after, Keevash and Sudakov proved that if G is an orientation of a graph on n vertices in which every vertex has both indegree and outdegree at least (1/2 - o(1))n, then there exists a collection of vertex-disjoint cyclic triangles that covers all but at most 3 vertices. In this paper, we resolve the conjecture of Cuckler and Yuster for sufficiently large n.