Shallow, Low, and Light Trees, and Tight Lower Bounds for Euclidean Spanners

Abstract

We show that for every n-point metric space M there exists a spanning tree T with unweighted diameter O( n) and weight ω(T) = O( n) · ω(MST(M)). Moreover, there is a designated point rt such that for every point v, distT(rt,v) (1+ε) · distM(rt,v), for an arbitrarily small constant ε > 0. We extend this result, and provide a tradeoff between unweighted diameter and weight, and prove that this tradeoff is tight up to constant factors in the entire range of parameters. These results enable us to settle a long-standing open question in Computational Geometry. In STOC'95 Arya et al. devised a construction of Euclidean Spanners with unweighted diameter O( n) and weight O( n) · ω(MST(M)). Ten years later in SODA'05 Agarwal et al. showed that this result is tight up to a factor of O( n). We close this gap and show that the result of Arya et al. is tight up to constant factors.