On the Approximability and Hardness of the Minimum Connected Dominating Set with Routing Cost Constraint

Abstract

In the problem of minimum connected dominating set with routing cost constraint, we are given a graph G=(V,E), and the goal is to find the smallest connected dominating set D of G such that, for any two non-adjacent vertices u and v in G, the number of internal nodes on the shortest path between u and v in the subgraph of G induced by D \u,v\ is at most α times that in G. For general graphs, the only known previous approximability result is an O( n)-approximation algorithm (n=|V|) for α = 1 by Ding et al. For any constant α > 1, we give an O(n1-1α( n)1α)-approximation algorithm. When α ≥ 5, we give an O(n n)-approximation algorithm. Finally, we prove that, when α =2, unless NP ⊂eq DTIME(npoly n), for any constant ε > 0, the problem admits no polynomial-time 2^1-εn-approximation algorithm, improving upon the ( n) bound by Du et al. (albeit under a stronger hardness assumption).