Approximating Source Location and Star Survivable Network Problems

Abstract

In Source Location (SL) problems the goal is to select a mini-mum cost source set S ⊂eq V such that the connectivity (or flow) (S,v) from S to any node v is at least the demand dv of v. In many SL problems (S,v)=dv if v ∈ S, namely, the demand of nodes selected to S is completely satisfied. In a node-connectivity variant suggested recently by Fukunaga, every node v gets a "bonus" pv ≤ dv if it is selected to S. Fukunaga showed that for undirected graphs one can achieve ratio O(k k) for his variant, where k=v ∈ Vdv is the maximum demand. We improve this by achieving ratio \p*,k\· O( (k/q*)) for a more general version with node capacities, where p*=v ∈ V pv is the maximum bonus and q*=v ∈ V qv is the minimum capacity. In particular, for the most natural case p*=1 considered by Fukunaga, we improve the ratio from O(k k) to O(2k). We also get ratio O(k) for the edge-connectivity version, for which no ratio that depends on k only was known before. To derive these results, we consider a particular case of the Survivable Network (SN) problem when all edges of positive cost form a star. We give ratio O(\ n,2 k\) for this variant, improving over the best ratio known for the general case O(k3 n) of Chuzhoy and Khanna.