Let D be a set of n pairwise disjoint unit balls in R-d and P the set of their centers. A hyperplane H is an m-separator for D if every closed halfspace bounded by H contains at least m points from P. This generalizes the notion of halving hyperplanes, which correspond to n/2-separators. The analogous notion for point sets is well studied. Separators have various applications, for instance, in divide-and-conquer schemes. In such a scheme, any ball that is intersected by the separating hyperplane may still interact with both sides of the partition. Therefore it is desirable that the separating hyperplane intersects a small number of balls only.We present three deterministic algorithms to bisect a given set of pairwise disjoint unit balls by ...
We are given a set of n d-dimensional (possibly intersecting) isothetic hyperrectangles. The topic o...
AbstractIn this paper, algorithms are presented to determine weak and wide linear and spherical sepa...
We prove new theorems which describe a necessary and sufficient condition for linear (strong and non...
Let D be a set of n pairwise disjoint unit balls in Rd and P the set of their center points. A hyper...
Abstract. A collection of n balls in d dimensions forms a k-ply system if no point in the space is c...
AbstractWe introduce the notion of the width bounded geometric separator and develop the techniques ...
Consider the following fundamental problem: given two sets R and G of objects positioned in d-dimens...
Many interesting problems in Discrete and Computational Geometry involve partitioning. A main questi...
Finding nonoverlapping balls with given centers in any metric space, maximizing the sum of radii of ...
We introduce the notion of width bounded geometric separator, develop the techniques for its existen...
Given a set of m points in the Euclidean space Rn, the problem of the minimum enclosing ball of poin...
We consider the family of area bisectors of a polygon (possibly with holes) in the plane. We say tha...
A geometric separator for a set U of n geometric ob-jects (usually balls) is a small (sublinear in n...
AbstractWe call a line l a separator for a set S of objects in the plane if l avoids all the objects...
We study nested partitions of Rd obtained by successive cuts us-ing hyperplanes with fixed direction...
We are given a set of n d-dimensional (possibly intersecting) isothetic hyperrectangles. The topic o...
AbstractIn this paper, algorithms are presented to determine weak and wide linear and spherical sepa...
We prove new theorems which describe a necessary and sufficient condition for linear (strong and non...
Let D be a set of n pairwise disjoint unit balls in Rd and P the set of their center points. A hyper...
Abstract. A collection of n balls in d dimensions forms a k-ply system if no point in the space is c...
AbstractWe introduce the notion of the width bounded geometric separator and develop the techniques ...
Consider the following fundamental problem: given two sets R and G of objects positioned in d-dimens...
Many interesting problems in Discrete and Computational Geometry involve partitioning. A main questi...
Finding nonoverlapping balls with given centers in any metric space, maximizing the sum of radii of ...
We introduce the notion of width bounded geometric separator, develop the techniques for its existen...
Given a set of m points in the Euclidean space Rn, the problem of the minimum enclosing ball of poin...
We consider the family of area bisectors of a polygon (possibly with holes) in the plane. We say tha...
A geometric separator for a set U of n geometric ob-jects (usually balls) is a small (sublinear in n...
AbstractWe call a line l a separator for a set S of objects in the plane if l avoids all the objects...
We study nested partitions of Rd obtained by successive cuts us-ing hyperplanes with fixed direction...
We are given a set of n d-dimensional (possibly intersecting) isothetic hyperrectangles. The topic o...
AbstractIn this paper, algorithms are presented to determine weak and wide linear and spherical sepa...
We prove new theorems which describe a necessary and sufficient condition for linear (strong and non...