We present improved upper bounds for the size of relative (p, ε)-approximation for range spaces with the following property: For any (finite) range space projected onto (that is, restricted to) a ground set of size n and for any parameter 1 ≤ k ≤ n, the number of ranges of size at most k is only nearly-linear in n and polynomial in k. Such range spaces are called “well behaved”. Our bound is an improvement over the bound O log (1/p) ε2p introduced by Li et al. [17] for the general case (where this bound has been shown to be tight in the worst case), when p ≪ ε. We also show that such small size relative (p, ε)-approximations can be constructed in expected polynomial time. Our bound also has an interesting interpretation in the context of “p...
The range searching problem is a fundamental problem in computational geometry, with numerous import...
Range searching is a well known problem in the area of geometric data structures. We consider this p...
AbstractRestricted range approximation in uniform norm from an extended Haar space of a certain orde...
The paper consists of two major parts. In the first part, we re-examine relative ε-approximations, p...
AbstractWe give an efficient deterministic algorithm for computing ϵ-approximations and ϵ-nets for r...
Abstract. We consider smoothed versions of geometric range spaces, so an element of the ground set (...
International audienceFollowing groundbreaking work by Haussler and Welzl (1987), the use of small-n...
Following groundbreaking work by Haussler and Welzl (1987), the use of small ε-nets has become a sta...
This thesis deals with strong and weak -nets in geometry and related problems. In the first half of...
International audienceFollowing groundbreaking work by Haussler and Welzl (1987), the use of small-n...
We study the problem of 2-dimensional orthogonal range counting with additive error. Given a set P o...
We study the problem of finding small weak ε-nets in three dimensions and provide new upper and lowe...
This thesis deals with strong and weak ǫ-nets in geometry and related problems. In the first ha...
Abstract: Range searching is a well known problem in the area of geometric data structures. We consi...
Range searching is a well known problem in the area of geometric data structures. We consider this p...
The range searching problem is a fundamental problem in computational geometry, with numerous import...
Range searching is a well known problem in the area of geometric data structures. We consider this p...
AbstractRestricted range approximation in uniform norm from an extended Haar space of a certain orde...
The paper consists of two major parts. In the first part, we re-examine relative ε-approximations, p...
AbstractWe give an efficient deterministic algorithm for computing ϵ-approximations and ϵ-nets for r...
Abstract. We consider smoothed versions of geometric range spaces, so an element of the ground set (...
International audienceFollowing groundbreaking work by Haussler and Welzl (1987), the use of small-n...
Following groundbreaking work by Haussler and Welzl (1987), the use of small ε-nets has become a sta...
This thesis deals with strong and weak -nets in geometry and related problems. In the first half of...
International audienceFollowing groundbreaking work by Haussler and Welzl (1987), the use of small-n...
We study the problem of 2-dimensional orthogonal range counting with additive error. Given a set P o...
We study the problem of finding small weak ε-nets in three dimensions and provide new upper and lowe...
This thesis deals with strong and weak ǫ-nets in geometry and related problems. In the first ha...
Abstract: Range searching is a well known problem in the area of geometric data structures. We consi...
Range searching is a well known problem in the area of geometric data structures. We consider this p...
The range searching problem is a fundamental problem in computational geometry, with numerous import...
Range searching is a well known problem in the area of geometric data structures. We consider this p...
AbstractRestricted range approximation in uniform norm from an extended Haar space of a certain orde...