English

A $(4+\epsilon)$-approximation for $k$-connected subgraphs

Data Structures and Algorithms 2019-01-23 v1

Abstract

We obtain approximation ratio 2(2+1)2(2+\frac{1}{\ell}) for the (undirected) kk-Connected Subgraph problem, where 12(logkn1)\ell \approx \frac{1}{2} (\log_k n-1) is the largest integer such that 21k2+1n2^{\ell-1} k^{2\ell+1} \leq n. For large values of nn this improves the 66-approximation of Cheriyan and V\'egh when n=Ω(k3)n =\Omega(k^3), which is the case =1\ell=1. For kk bounded by a constant we obtain ratio 4+ϵ4+\epsilon. For large values of nn our ratio matches the best known ratio 44 for the augmentation version of the problem, as well as the best known ratios for k=6,7k=6,7. Similar results are shown for the problem of covering an arbitrary crossing supermodular biset function.

Cite

@article{arxiv.1901.07246,
  title  = {A $(4+\epsilon)$-approximation for $k$-connected subgraphs},
  author = {Zeev Nutov},
  journal= {arXiv preprint arXiv:1901.07246},
  year   = {2019}
}
R2 v1 2026-06-23T07:18:14.841Z