Cycles of each even lengths in balanced bipartite digraphs

Abstract

Let D be a strongly connected balanced bipartite directed graph of order 2a≥ 4. Let x,y be distinct vertices in D. \x,y\ dominates a vertex z if x→ z and y→ z; in this case, we call the pair \x,y\ dominating. In this paper we prove: (i). If a≥ 4 and max\d(x), d(y)\≥ 2a-1 for every dominating pair of vertices \x,y\, D then contains a cycle of length 2a-2 or D is a directed cycle. (ii). If D contains a cycle of length 2a-2≥ 6 and max \d(x), d(y)\≥ 2a-2 for every dominating pair of vertices \x,y\, then for any k, 1≤ k≤ a-1, D contains a cycle of length 2k. (iii). If a≥ 4 and max\d(x), d(y)\≥ 2a-1 for every dominating pair of vertices \x,y\, then for every k, 1≤ k≤ a, D contains a cycle of length 2k unless D is isomorphic to only one exceptional digraph of order eight.