Sketched MinDist
Abstract
We consider sketch vectors of geometric objects through the \mindist function for from a point set . Collecting the vector of these sketch values induces a simple, effective, and powerful distance: the Euclidean distance between these sketched vectors. This paper shows how large this set needs to be under a variety of shapes and scenarios. For hyperplanes we provide direct connection to the sensitivity sample framework, so relative error can be preserved in dimensions using . However, for other shapes, we show we need to enforce a minimum distance parameter , and a domain size . For the sample size then can be . For objects (e.g., trajectories) with at most pieces this can provide stronger \emph{for all} approximations with points. Moreover, with similar size bounds and restrictions, such trajectories can be reconstructed exactly using only these sketch vectors.
Cite
@article{arxiv.1907.02171,
title = {Sketched MinDist},
author = {Jeff M. Phillips and Pingfan Tang},
journal= {arXiv preprint arXiv:1907.02171},
year = {2019}
}