The problem of computing a 2-T-connected spanning subgraph with minimum number of edges in directed graphs

Abstract

Let G=(V,E) be a strongly connected graph with |V|≥ 3. For T⊂eq V, the strongly connected graph G is 2-T-connected if G is 2-edge-connected and for each vertex w in T, w is not a strong articulation point. This concept generalizes the concept of 2-vertex connectivity when T contains all the vertices in G. This concept also generalizes the concept of 2-edge connectivity when |T|=0. The concept of 2-T-connectivity was introduced by Durand de Gevigney and Szigeti in 2018. In this paper, we prove that there is a polynomial-time 4-approximation algorithm for the following problem: given a 2-T-connected graph G=(V,E), identify a subset E 2T ⊂eq E of minimum cardinality such that (V,E2T) is 2-T-connected.