Approximate Nearest-Neighbor Search for Line Segments

Abstract

Approximate nearest-neighbor search is a fundamental algorithmic problem that continues to inspire study due its essential role in numerous contexts. In contrast to most prior work, which has focused on point sets, we consider nearest-neighbor queries against a set of line segments in Rd, for constant dimension d. Given a set S of n disjoint line segments in Rd and an error parameter > 0, the objective is to build a data structure such that for any query point q, it is possible to return a line segment whose Euclidean distance from q is at most (1+) times the distance from q to its nearest line segment. We present a data structure for this problem with storage O((n2/d) (/)) and query time O( ((n,)/)), where is the spread of the set of segments S. Our approach is based on a covering of space by anisotropic elements, which align themselves according to the orientations of nearby segments.