Add to ORKGWe study the 2-center problem for moving points in the plane. Given a set P of n points, the Euclidean 2-center problem asks for two congruent disks of minimum size that together cover P. Our methods work in the black-box KDS model, where we receive the locations of the points at regular time steps and we know an upper bound d_max on the maximum displacement of any point within one time step. We show how to maintain a (1 + e)-approximation of the Euclidean 2-center in amortized sub-linear time per time step, under certain assumptions on the distribution of the point set P. In many cases --namely when the distance between the centers of the disks is relatively large or relatively small-- the solution we maintain is actually optimal
Proximity problems is a class of important problems which involve estimation of distances between ge...
AbstractWe obtain hardness results and approximation algorithms for two related geometric problems i...
AbstractThis paper considers the planar Euclidean two-center problem: given a planar n-point set S, ...
We study the 2-center problem for moving points in the plane. Given a set P of n points, the Euclide...
We study two versions of the 2-center problem for moving points in the plane. Given a set P of n poi...
We study the k-center problem in a kinetic setting: given a set of continuously moving points P in t...
AbstractTwo complications frequently arise in real-world applications, motion and the contamination ...
We present an algorithm for computing the discrete 2-center of a set P of n points in the plane; th...
Over the past decade, the kinetic-data-structures framework has become the standard in computational...
We study the k-center problem in a kinetic setting: given a set of continuously moving points P in t...
We present an algorithm for computing the discrete 2-center of a set P of n points in the plane; tha...
Over the past decade, the kinetic-data-structures framework has become the standard in computational...
Over the past decade, the kinetic-data-structures framework has become the standard in computational...
Over the past decade, the kinetic-data-structures framework has become thestandard in computational ...
We present an O(n log 9 n)-time algorithm for computing the 2-center of a set S of n points in the p...
Proximity problems is a class of important problems which involve estimation of distances between ge...
AbstractWe obtain hardness results and approximation algorithms for two related geometric problems i...
AbstractThis paper considers the planar Euclidean two-center problem: given a planar n-point set S, ...
We study the 2-center problem for moving points in the plane. Given a set P of n points, the Euclide...
We study two versions of the 2-center problem for moving points in the plane. Given a set P of n poi...
We study the k-center problem in a kinetic setting: given a set of continuously moving points P in t...
AbstractTwo complications frequently arise in real-world applications, motion and the contamination ...
We present an algorithm for computing the discrete 2-center of a set P of n points in the plane; th...
Over the past decade, the kinetic-data-structures framework has become the standard in computational...
We study the k-center problem in a kinetic setting: given a set of continuously moving points P in t...
We present an algorithm for computing the discrete 2-center of a set P of n points in the plane; tha...
Over the past decade, the kinetic-data-structures framework has become the standard in computational...
Over the past decade, the kinetic-data-structures framework has become the standard in computational...
Over the past decade, the kinetic-data-structures framework has become thestandard in computational ...
We present an O(n log 9 n)-time algorithm for computing the 2-center of a set S of n points in the p...
Proximity problems is a class of important problems which involve estimation of distances between ge...
AbstractWe obtain hardness results and approximation algorithms for two related geometric problems i...
AbstractThis paper considers the planar Euclidean two-center problem: given a planar n-point set S, ...