An 2k-approximation algorithm for minimum power k edge disjoint st -paths

Abstract

In minimum power network design problems we are given an undirected graph G=(V,E) with edge costs \ce:e ∈ E\. The goal is to find an edge set F⊂eq E that satisfies a prescribed property of minimum power pc(F)=Σv ∈ V \ce: e ∈ F is incident to v\. In the Min-Power k Edge Disjoint st-Paths problem F should contains k edge disjoint st-paths. The problem admits a k-approximation algorithm, and it was an open question whether it admits approximation ratio sublinear in k even for unit costs. We give a 22k-approximation algorithm for general costs.