Strong subgraph k-connectivity bounds

Abstract

Let D=(V,A) be a digraph of order n, S a subset of V of size k and 2 k≤ n. Strong subgraphs D1, … , Dp containing S are said to be internally disjoint if V(Di) V(Dj)=S and A(Di) A(Dj)= for all 1 i<j p. Let S(D) be the maximum number of internally disjoint strong digraphs containing S in D. The strong subgraph k-connectivity is defined as k(D)=\S(D) S⊂eq V, |S|=k\. A digraph D=(V, A) is called minimally strong subgraph (k,)-connected if k(D)≥ but for any arc e∈ A, k(D-e)≤ -1. In this paper, we first give a sharp upper bound for the parameter k(D) and then study the minimally strong subgraph (k,)-connected digraphs.