Large ( d, D, D′, s)-bipartite digraphs

Abstract

A ( d, D, D′, s)-digraph is a directed graph with diameter D and maximum out-degree d such that after the deletion of any s of its vertices the resulting digraph has diameter at most D′. Our concern is to find large, i.e. with order as large as possible, ( d, D, D′, s)-bipartite digraphs. To this end, it is proved that some members of a known family of large bipartite digraphs satisfy a Menger-type condition. Namely, between any pair of non-adjacent vertices they have s + 1 internally disjoint paths of length at most D′. Then, a new family of ( d, D, D′, s)-bipartite digraphs with order very close to the upper bound is obtained.