A (4+ε)-approximation for k-connected subgraphs

Abstract

We obtain approximation ratio 2(2+1) for the (undirected) k-Connected Subgraph problem, where ≈ 12 (k n-1) is the largest integer such that 2-1 k2+1 ≤ n. For large values of n this improves the 6-approximation of Cheriyan and V\'egh when n =(k3), which is the case =1. For k bounded by a constant we obtain ratio 4+ε. For large values of n our ratio matches the best known ratio 4 for the augmentation version of the problem, as well as the best known ratios for k=6,7. Similar results are shown for the problem of covering an arbitrary crossing supermodular biset function.