English

Bicriteria approximation for $k$-edge-connectivity

Data Structures and Algorithms 2025-07-08 v1

Abstract

In the kk-Edge Connected Spanning Subgraph (kk-ECSS) problem we are given a (multi-)graph G=(V,E)G=(V,E) with edge costs and an integer kk, and seek a min-cost kk-edge-connected spanning subgraph of GG. The problem admits a 22-approximation algorithm and no better approximation ratio is known. Recently, Hershkowitz, Klein, and Zenklusen [STOC 24] gave a bicriteria (1,k10)(1,k-10)-approximation algorithm that computes a (k10)(k-10)-edge-connected spanning subgraph of cost at most the optimal value of a standard Cut-LP for kk-ECSS. We improve the bicriteria approximation to (1,k4)(1,k-4), and also give another non-trivial bicriteria approximation (3/2,k2)(3/2,k-2). The kk-Edge-Connected Spanning Multi-subgraph (kk-ECSM) problem is almost the same as kk-ECSS, except that any edge can be selected multiple times at the same cost. A (1,kp)(1,k-p) bicriteria approximation for kk-ECSS w.r.t. Cut-LP implies approximation ratio 1+p/k1+p/k for kk-ECSM, hence our result also improves the approximation ratio for kk-ECSM.

Keywords

Cite

@article{arxiv.2507.03786,
  title  = {Bicriteria approximation for $k$-edge-connectivity},
  author = {Zeev Nutov and Reut Cohen},
  journal= {arXiv preprint arXiv:2507.03786},
  year   = {2025}
}
R2 v1 2026-07-01T03:47:12.895Z