Extremal results for directed tree connectivity

Abstract

For a digraph D=(V(D), A(D)), and a set S⊂eq V(D) with r∈ S and |S|≥ 2, an (S, r)-tree is an out-tree T rooted at r with S⊂eq V(T). Two (S, r)-trees T1 and T2 are said to be arc-disjoint if A(T1) A(T2)=. Two arc-disjoint (S, r)-trees T1 and T2 are said to be internally disjoint if V(T1) V(T2)=S. Let S,r(D) and λS,r(D) be the maximum number of internally disjoint and arc-disjoint (S, r)-trees in D, respectively. The generalized k-vertex-strong connectivity of D is defined as k(D)= \S,r(D) S⊂ V(D), |S|=k, r∈ S\. Similarly, the generalized k-arc-strong connectivity of D is defined as λk(D)= \λS,r(D) S⊂ V(D), |S|=k, r∈ S\. The generalized k-vertex-strong connectivity and generalized k-arc-strong connectivity are also called directed tree connectivity which could be seen as a generalization of classical connectivity of digraphs. A digraph D=(V(D), A(D)) is called minimally generalized (k, )-vertex (respectively, arc)-strongly connected if k(D)≥ (respectively, λk(D)≥ ) but for any arc e∈ A(D), k(D-e)≤ -1 (respectively, λk(D-e)≤ -1). In this paper, we study the minimally generalized (k, )-vertex (respectively, arc)-strongly connected digraphs. We compute the minimum and maximum sizes of these digraphs, and give characterizations of such digraphs for some pairs of k and .