Small -edge-covers in k-connected graphs

Abstract

Let G=(V,E) be a k-edge-connected graph with edge costs \c(e):e ∈ E\ and let 1 ≤ ≤ k-1. We show by a simple and short proof, that G contains an -edge cover I such that: c(I) ≤ kc(E) if G is bipartite, or if |V| is even, or if |E| ≥ k|V|2 +k2; otherwise, c(I) ≤ (k+1k|V|)c(E). The particular case =k-1 and unit costs already includes a result of Cheriyan and Thurimella, that G contains a (k-1)-edge-cover of size |E|- |V|/2 . Using our result, we slightly improve the approximation ratios for the k-Connected Subgraph problem (the node-connectivity version) with uniform and β-metric costs. We then consider the dual problem of finding a spanning subgraph of maximum connectivity k* with a prescribed number of edges. We give an algorithm that computes a (k*-1)-connected subgraph, which is tight, since the problem is NP-hard.