Improved approximation algorithms for some capacitated k edge connectivity problems

Abstract

We consider the following two variants of the Capacitated k-Edge Connected Subgraph (Cap-k-ECS) problem. Near Min-Cuts Cover: Given a graph G=(V,E) with edge costs and E0 ⊂eq E, find a min-cost edge set J ⊂eq E E0 that covers all cuts with at most k-1 edges of the graph G0=(V,E0). We obtain approximation ratio k-λ0+1+ε, improving the ratio 2\k-λ0,8\ of Bansal, Cheriyan, Grout, and Ibrahimpur for k-λ0 ≤ 14,where λ0 is the edge connectivity of G0. (k,q)-Flexible Graph Connectivity ((k,q)-FGC): Given a graph G=(V,E) with edge costs and a set U ⊂eq E of ''unsafe'' edges and integers k,q, find a min-cost subgraph H of G such that every cut of H has at least k safe edges or at least k+q edges. We show that (k,1)-FGC admits approximation ratio 3.5+ε if k is odd (improving the previous ratio 4), and that (k,2)-FGC admits approximation ratio 6 if k is even and 7+ε if k is odd (improving the previous ratio 20).