In this paper we present novel streaming algorithms for the k-center and the diameter estimation problems for general metric spaces under the sliding window model. The key idea behind our algorithms is to maintain a small coreset which, at any time, allows to compute a solution to the problem under consideration for the current window, whose quality can be made arbitrarily close to the one of the best solution attainable by running a polynomial-time sequential algorithm on the entire window. Remarkably, the size of our coresets is independent of the window length and can be upper bounded by a function of the target number of centers (for the k-center problem), of the desired accuracy, and of the characteristics of the current window, namely...
Introduced by Agarwal, Har-Peled, and Varadarajan [J. ACM, 2004], an epsilon-kernel of a point set i...
We present a new streaming algorithm for maintaining an ε-kernel of a point set in Rd using O((1/ε(d...
In the Non-Uniform k-Center problem we need to cover a finite metric space using k balls of differen...
In this paper we present novel streaming algorithms for the k-center and the diameter estimation pro...
In this paper we present a novel streaming algorithm for the k-center clustering problem for general...
In this paper we develop streaming algorithms for the diameter problem and the k-center clustering p...
In this paper we develop streaming algorithms for the diameter problem and the k-center clustering p...
Metric k-center clustering is a fundamental unsupervised learning primitive. Although widely used, t...
Metric k-center clustering is a fundamental unsupervised learning primitive. Although widely used, t...
We explore clustering problems in the streaming sliding window model in both general metric spaces a...
In PODS 2003, Babcock, Datar, Motwani and O’Callaghan [4] gave the first streaming solution for the ...
Abstract. We study the problem of maintaining a (1+ɛ)-factor approximation of the diameter of a stre...
In the k-center problem for streaming points in d-dimensional metric space, input points are given i...
In the matroid center problem, which generalizes the k-center problem, we need to pick a set of cent...
We study the 2-center problem with outliers in high-dimensional data streams. Given a stream of poin...
Introduced by Agarwal, Har-Peled, and Varadarajan [J. ACM, 2004], an epsilon-kernel of a point set i...
We present a new streaming algorithm for maintaining an ε-kernel of a point set in Rd using O((1/ε(d...
In the Non-Uniform k-Center problem we need to cover a finite metric space using k balls of differen...
In this paper we present novel streaming algorithms for the k-center and the diameter estimation pro...
In this paper we present a novel streaming algorithm for the k-center clustering problem for general...
In this paper we develop streaming algorithms for the diameter problem and the k-center clustering p...
In this paper we develop streaming algorithms for the diameter problem and the k-center clustering p...
Metric k-center clustering is a fundamental unsupervised learning primitive. Although widely used, t...
Metric k-center clustering is a fundamental unsupervised learning primitive. Although widely used, t...
We explore clustering problems in the streaming sliding window model in both general metric spaces a...
In PODS 2003, Babcock, Datar, Motwani and O’Callaghan [4] gave the first streaming solution for the ...
Abstract. We study the problem of maintaining a (1+ɛ)-factor approximation of the diameter of a stre...
In the k-center problem for streaming points in d-dimensional metric space, input points are given i...
In the matroid center problem, which generalizes the k-center problem, we need to pick a set of cent...
We study the 2-center problem with outliers in high-dimensional data streams. Given a stream of poin...
Introduced by Agarwal, Har-Peled, and Varadarajan [J. ACM, 2004], an epsilon-kernel of a point set i...
We present a new streaming algorithm for maintaining an ε-kernel of a point set in Rd using O((1/ε(d...
In the Non-Uniform k-Center problem we need to cover a finite metric space using k balls of differen...