A $4/3$ Approximation for $2$-Vertex-Connectivity
Abstract
The 2-Vertex-Connected Spanning Subgraph problem (2VCSS) is among the most basic NP-hard (Survivable) Network Design problems: we are given an (unweighted) undirected graph . Our goal is to find a spanning subgraph of with the minimum number of edges which is -vertex-connected, namely remains connected after the deletion of an arbitrary node. 2VCSS is well-studied in terms of approximation algorithms, and the current best (polynomial-time) approximation factor is by Heeger and Vygen [SIDMA'17] (improving on earlier results by Khuller and Vishkin [STOC'92] and Garg, Vempala and Singla [SODA'93]). Here we present an improved approximation. Our main technical ingredient is an approximation preserving reduction to a conveniently structured subset of instances which are ``almost'' 3-vertex-connected. The latter reduction might be helpful in future work.
Cite
@article{arxiv.2305.02240,
title = {A $4/3$ Approximation for $2$-Vertex-Connectivity},
author = {Miguel Bosch-Calvo and Fabrizio Grandoni and Afrouz Jabal Ameli},
journal= {arXiv preprint arXiv:2305.02240},
year = {2025}
}
Comments
44 pages. This is the TheoretiCS journal version