On Locality-Sensitive Orderings and their Applications (1809.11147v3)

Abstract: For any constant $d$ and parameter $\varepsilon > 0$, we show the existence of (roughly) $1/\varepsilon^d$ orderings on the unit cube $[0,1)^d$, such that any two points $p,q\in [0,1)^d$ that are close together under the Euclidean metric are "close together" in one of these linear orderings in the following sense: the only points that could lie between $p$ and $q$ in the ordering are points with Euclidean distance at most $\varepsilon| p - q |$ from $p$ or $q$. These orderings are extensions of the $\mathcal{Z}$-order, and they can be efficiently computed. Functionally, the orderings can be thought of as a replacement to quadtrees and related structures (like well-separated pair decompositions). We use such orderings to obtain surprisingly simple algorithms for a number of basic problems in low-dimensional computational geometry, including (i) dynamic approximate bichromatic closest pair, (ii) dynamic spanners, (iii) dynamic approximate minimum spanning trees, (iv) static and dynamic fault-tolerant spanners, and (v) approximate nearest neighbor search.