Short directed cycles in bipartite digraphs

Abstract

The Caccetta-H\"aggkvist conjecture implies that for every integer k 1, if G is a bipartite digraph, with n vertices in each part, and every vertex has out-degree more than n/(k+1), then G has a directed cycle of length at most 2k. If true this is best possible, and we prove this for k = 1,2,3,4,6 and all k 224,539. More generally, we conjecture that for every integer k 1, and every pair of reals α, β> 0 with kα +β>1, if G is a bipartite digraph with bipartition (A,B), where every vertex in A has out-degree at least β|B|, and every vertex in B has out-degree at least α|A|, then G has a directed cycle of length at most 2k. This implies the Caccetta-H\"aggkvist conjecture (set β>0 and very small), and again is best possible for infinitely many pairs (α,β). We prove this for k = 1,2, and prove a weaker statement (that α+β>2/(k+1) suffices) for k=3,4.