We revisit the orthogonal range searching problem and the exact l_infinity nearest neighbor searching problem for a static set of n points when the dimension d is moderately large. We give the first data structure with near linear space that achieves truly sublinear query time when the dimension is any constant multiple of log n. Specifically, the preprocessing time and space are O(n^{1+delta}) for any constant delta>0, and the expected query time is n^{1-1/O(c log c)} for d = c log n. The data structure is simple and is based on a new "augmented, randomized, lopsided" variant of k-d trees. It matches (in fact, slightly improves) the performance of previous combinatorial algorithms that work only in the case of offline queries [Impagliaz...
[[abstract]]This paper considers a type of orthogonal range query, called orthogonal range successor...
We show that the eccentricities, diameter, radius, and Wiener index of an undirected n-vertex graph ...
AbstractApplying standard dimensionality reduction techniques, we show how to perform approximate ra...
AbstractIn this paper we describe space-efficient data structures for the two-dimensional range sear...
In this paper we present new data structures for two extensively studied variants of the orthogonal ...
AbstractWe present the first adaptive data structure for two-dimensional orthogonal range search. Ou...
AbstractThe range searching problem is a fundamental problem in computational geometry, with numerou...
AbstractLet P be a set of n points that lie on an n×n grid. The well-known orthogonal range reportin...
Orthogonal range searches arise in many areas of application, most often, in database queries. Many ...
We study a longstanding problem in computational geometry: 2-d dynamic orthogonal range reporting. W...
Orthogonal range reporting is the problem of storing a set of n points in d-dimensional space, such ...
We study a longstanding problem in computational geometry: 2-d dynamic orthogonal range reporting. ...
We propose a simple variant of kd-trees, called rank-based kd-trees, for sets of points in~$Reals^d$...
We show that the eccentricities, diameter, radius, and Wiener index of an undirected $n$-vertex grap...
. We analyze the expected time complexity of range searching with k-d trees in all dimensions when t...
[[abstract]]This paper considers a type of orthogonal range query, called orthogonal range successor...
We show that the eccentricities, diameter, radius, and Wiener index of an undirected n-vertex graph ...
AbstractApplying standard dimensionality reduction techniques, we show how to perform approximate ra...
AbstractIn this paper we describe space-efficient data structures for the two-dimensional range sear...
In this paper we present new data structures for two extensively studied variants of the orthogonal ...
AbstractWe present the first adaptive data structure for two-dimensional orthogonal range search. Ou...
AbstractThe range searching problem is a fundamental problem in computational geometry, with numerou...
AbstractLet P be a set of n points that lie on an n×n grid. The well-known orthogonal range reportin...
Orthogonal range searches arise in many areas of application, most often, in database queries. Many ...
We study a longstanding problem in computational geometry: 2-d dynamic orthogonal range reporting. W...
Orthogonal range reporting is the problem of storing a set of n points in d-dimensional space, such ...
We study a longstanding problem in computational geometry: 2-d dynamic orthogonal range reporting. ...
We propose a simple variant of kd-trees, called rank-based kd-trees, for sets of points in~$Reals^d$...
We show that the eccentricities, diameter, radius, and Wiener index of an undirected $n$-vertex grap...
. We analyze the expected time complexity of range searching with k-d trees in all dimensions when t...
[[abstract]]This paper considers a type of orthogonal range query, called orthogonal range successor...
We show that the eccentricities, diameter, radius, and Wiener index of an undirected n-vertex graph ...
AbstractApplying standard dimensionality reduction techniques, we show how to perform approximate ra...