On directed 2-factors in digraphs and 2-factors containing perfect matchings in bipartite graphs

Abstract

In this paper, we give the following result: If D is a digraph of order n, and if dD+(u) + dD-(v) n for every two distinct vertices u and v with (u, v) A(D), then D has a directed 2-factor with exactly k directed cycles of length at least 3, where n 12k+3. This result is equivalent to the following result: If G is a balanced bipartite graph of order 2n with partite sets X and Y, and if dG(x)+dG(y) n + 2 for every two vertices x ∈ X and y ∈ Y with xy E(G), then for every perfect matching M, G has a 2-factor with exactly k cycles of length at least 6 containing every edge of M, where n 12k+3. These results are generalizations of theorems concerning Hamilton cycles due to Woodall (1972) and Las Vergnas (1972), respectively.