English

Directed Steiner tree packing and directed tree connectivity

Combinatorics 2020-11-10 v3

Abstract

For a digraph D=(V(D),A(D))D=(V(D), A(D)), and a set SV(D)S\subseteq V(D) with rSr\in S and S2|S|\geq 2, an (S,r)(S, r)-tree is an out-tree TT rooted at rr with SV(T)S\subseteq V(T). Two (S,r)(S, r)-trees T1T_1 and T2T_2 are said to be arc-disjoint if A(T1)A(T2)=A(T_1)\cap A(T_2)=\emptyset. Two arc-disjoint (S,r)(S, r)-trees T1T_1 and T2T_2 are said to be internally disjoint if V(T1)V(T2)=SV(T_1)\cap V(T_2)=S. Let κS,r(D)\kappa_{S,r}(D) and λS,r(D)\lambda_{S,r}(D) be the maximum number of internally disjoint and arc-disjoint (S,r)(S, r)-trees in DD, respectively. The generalized kk-vertex-strong connectivity of DD is defined as κk(D)=min{κS,r(D)SV(D),S=k,rS}.\kappa_k(D)= \min \{\kappa_{S,r}(D)\mid S\subset V(D), |S|=k, r\in S\}. Similarly, the generalized kk-arc-strong connectivity of DD is defined as λk(D)=min{λS,r(D)SV(D),S=k,rS}.\lambda_k(D)= \min \{\lambda_{S,r}(D)\mid S\subset V(D), |S|=k, r\in S\}. The generalized kk-vertex-strong connectivity and generalized kk-arc-strong connectivity are also called directed tree connectivity which extends the well-established tree connectivity on undirected graphs to directed graphs and could be seen as a generalization of classical connectivity of digraphs. In this paper, we completely determine the complexity for both κS,r(D)\kappa_{S, r}(D) and λS,r(D)\lambda_{S, r}(D) on general digraphs, symmetric digraphs and Eulerian digraphs. In particular, among our results, we prove and use the NP-completeness of 2-linkage problem restricted to Eulerian digraphs. We also give sharp bounds and characterizations for the two parameters κk(D)\kappa_k(D) and λk(D)\lambda_k(D).

Keywords

Cite

@article{arxiv.2005.00849,
  title  = {Directed Steiner tree packing and directed tree connectivity},
  author = {Yuefang Sun and Anders Yeo},
  journal= {arXiv preprint arXiv:2005.00849},
  year   = {2020}
}
R2 v1 2026-06-23T15:15:44.970Z