Deterministic Distributed Construction of T-Dominating Sets in Time T

Abstract

A k-dominating set is a set D of nodes of a graph such that, for each node v, there exists a node w ∈ D at distance at most k from v. Our aim is the deterministic distributed construction of small T-dominating sets in time T in networks modeled as undirected n-node graphs and under the LOCAL communication model. For any positive integer T, if b is the size of a pairwise disjoint collection of balls of radii at least T in a graph, then b is an obvious lower bound on the size of a T-dominating set. Our first result shows that, even on rings, it is impossible to construct a T-dominating set of size s asymptotically b (i.e., such that s/b → 1) in time T. In the range of time T ∈ (* n), the size of a T-dominating set turns out to be very sensitive to multiplicative constants in running time. Indeed, it follows from KP, that for time T=γ * n with large constant γ, it is possible to construct a T-dominating set whose size is a small fraction of n. By contrast, we show that, for time T=α * n for small constant α, the size of a T-dominating set must be a large fraction of n. Finally, when T ∈ o (* n), the above lower bound implies that, for any constant x<1, it is impossible to construct a T-dominating set of size smaller than xn, even on rings. On the positive side, we provide an algorithm that constructs a T-dominating set of size n- (T) on all graphs.