Cycle-factors in oriented graphs

Abstract

Let k be a positive integer. A k-cycle-factor of an oriented graph is a set of disjoint cycles of length k that covers all vertices of the graph. In this paper, we prove that there exists a positive constant c such that for n sufficiently large, any oriented graph on n vertices with both minimum out-degree and minimum in-degree at least (1/2-c)n contains a k-cycle-factor for any k≥4. Additionally, under the same hypotheses, we also show that for any sequence n1, …, nt with Σti=1ni=n and the number of the ni equal to 3 is α n, where α is any real number with 0<α<1/3, the oriented graph contains t disjoint cycles of lengths n1, …, nt. This conclusion is the best possible in some sense and refines a result of Keevash and Sudakov.