### Abstract

The range tree is a fundamental data structure for multi-dimensional point sets, and as such, is central in a wide range of geometric and database applications. In this paper, we describe the first non-trivial adaptation of range trees to the parallel distributed memory setting (BSP like models). Given a set $L$ of $n$ points in $d$-dimensional Cartesian space, we show how to construct on a coarse grained multicomputer a distributed range tree $T$ in time $O(\frac{s}{p} + T_{c}(s,p))$, where $s = n \log^{d-1} n$ is the size of the sequential data structure and $T_{c}(s,p)$ is the time to perform an h-relations with $h=\Theta (s/p)$. We then show how $T$ can be used to answer a given set $Q$ of $m = O(n)$ range queries in time O($\frac{s\log n}{p} + T_{c}(s,p)$) and O($\frac{s\log n}{p} + T_{c}(s,p) + \frac{k}{p}$), for the associative-function and report modes respectively, where $k$ is the number of results to be reported. These parallel construction and search algorithms are both highly efficient, in that their running times are the sequential time divided by the number of processors, plus a constant number of parallel communication rounds.