A 5-Approximation Analysis for the Cover Small Cuts Problem

Abstract

In the Cover Small Cuts problem, we are given a capacitated (undirected) graph G=(V,E,u) and a threshold value λ, as well as a set of links L with end-nodes in V and a non-negative cost for each link ∈ L; the goal is to find a minimum-cost set of links such that each non-trivial cut of capacity less than λ is covered by a link. Bansal, Cheriyan, Grout, and Ibrahimpur (arXiv:2209.11209, Algorithmica 2024) showed that the WGMV primal-dual algorithm, due to Williamson, Goemans, Mihail, and Vazirani (Combinatorica, 1995), achieves approximation ratio 16 for the Cover Small Cuts problem; their analysis uses the notion of a pliable family of sets that satisfies a combinatorial property. Later, Bansal (arXiv:2308.15714v2, IPCO 2025) and then Nutov (arXiv:2504.03910, MFCS 2025) proved that the same algorithm achieves approximation ratio 6. We show that the same algorithm achieves approximation ratio 5, by using a stronger notion, namely, a pliable family of sets that satisfies symmetry and structural submodularity.