Fast Construction of Nets in Low Dimensional Metrics, and Their Applications
arXiv:cs/0409057 · doi:10.1137/S0097539704446281
Abstract
We present a near linear time algorithm for constructing hierarchical nets in finite metric spaces with constant doubling dimension. This data-structure is then applied to obtain improved algorithms for the following problems: Approximate nearest neighbor search, well-separated pair decomposition, compact representation scheme, doubling measure, and computation of the (approximate) Lipschitz constant of a function. In all cases, the running (preprocessing) time is near-linear and the space being used is linear.
41 pages. Extensive clean-up of minor English errors