Approximating k-connected m-dominating sets

Abstract

A subset S of nodes in a graph G is a k-connected m-dominating set ((k,m)-cds) if the subgraph G[S] induced by S is k-connected and every v ∈ V S has at least m neighbors in S. In the k-Connected m-Dominating Set ((k,m)-CDS) problem the goal is to find a minimum weight (k,m)-cds in a node-weighted graph. For m ≥ k we obtain the following approximation ratios. For general graphs our ratio O(k n) improves the previous best ratio O(k2 n) and matches the best known ratio for unit weights. For unit disc graphs we improve the ratio O(k k) to \mm-k,k2/3\ · O(2 k) -- this is the first sublinear ratio for the problem, and the first polylogarithmic ratio O(2 k)/ε when m ≥ (1+ε)k; furthermore, we obtain ratio \mm-k,k\ · O(2 k) for uniform weights. These results are obtained by showing the same ratios for the Subset k-Connectivity problem when the set T of terminals is an m-dominating set with m ≥ k.