Bipartitions with prescribed order of highly connected digraphs

Abstract

A digraph is strongly connected if it has a directed path from x to y for every ordered pair of distinct vertices x, y and it is strongly k-connected if it has at least k+1 vertices and remains strongly connected when we delete any set of at most k-1 vertices. For a digraph D, we use δ(D) to denote minv∈ V (D) |ND+(v) ND-(v)|. In this paper, we show the following result. Let k, l, n, n1, n2 ∈ N with n1+n2≤ n and n1,n2≥ n/20. Suppose that D is a strongly 107k(k+l)2(2kl)-connected digraph of order n with δ(D)≥ n-l. Then there exist two disjoint subsets V1, V2∈ V(D) with |V1| = n1 and |V2| = n2 such that each of D[V1], D[V2], and D[V1, V2] is strongly k-connected. In particular, V1 and V2 form a partition of V(D) when n1+n2=n. This result improves the earlier result of Kim, K\"uhn, and Osthus [SIAM J. Discrete Math. 30 (2016) 895--911].