Abstract. In this paper we present a novel analysis of a random sampling approach for three clustering problems in metric spaces: k-median, min-sum kclustering, and balanced k-median. For all these problems we consider the following simple sampling scheme: select a small sample set of points uniformly at random from V and then run some approximation algorithm on this sample set to compute an approximation of the best possible clustering of this set. Our main technical contribution is a significantly strengthened analysis of the approximation guarantee by this scheme for the clustering problems. The main motivation behind our analyses was to design sublinear-time algorithms for clustering problems. Our second contribution is the development ...
We present the rst constant-factor approximation algorithm for the metric k-median problem. The k-me...
International audienceWe consider the classic Facility Location, k-Median, and k-Means problems in m...
Approximation algorithms for clustering points in metric spaces is a flourishing area of research, w...
We present a novel analysis of a random sampling approach for four clustering problems in metric spa...
We present a general approach for designing approximation algorithms for a fundamental class of geom...
We consider two closely related fundamental clustering problems in this paper. In the min-sum k-clus...
The quality of K-Means clustering is extremely sensitive to proper initialization. The classic remed...
Matousek [Discrete Comput. Geom. 24 (1) (2000) 61-84] designed an O(nlogn) deterministic algorithm f...
AbstractMatousek [Discrete Comput. Geom. 24 (1) (2000) 61–84] designed an O(nlogn) deterministic alg...
We present the first linear time (1+ε)-approximation algorithm for the k-means problem for fixed k a...
Abstract—We consider k-median clustering in finite metric spaces and k-means clustering in Euclidean...
Approximation algorithms for clustering points in metric spaces is a flourishing area of re-search, ...
Recently, Bilu and Linial [6] formalized an implicit assumption often made when choosing a clusterin...
We give polynomial time approximation schemes for the problem of partitioning an input set of n poin...
Given a set of n points and their pairwise distances, the goal of clustering is to partition the po...
We present the rst constant-factor approximation algorithm for the metric k-median problem. The k-me...
International audienceWe consider the classic Facility Location, k-Median, and k-Means problems in m...
Approximation algorithms for clustering points in metric spaces is a flourishing area of research, w...
We present a novel analysis of a random sampling approach for four clustering problems in metric spa...
We present a general approach for designing approximation algorithms for a fundamental class of geom...
We consider two closely related fundamental clustering problems in this paper. In the min-sum k-clus...
The quality of K-Means clustering is extremely sensitive to proper initialization. The classic remed...
Matousek [Discrete Comput. Geom. 24 (1) (2000) 61-84] designed an O(nlogn) deterministic algorithm f...
AbstractMatousek [Discrete Comput. Geom. 24 (1) (2000) 61–84] designed an O(nlogn) deterministic alg...
We present the first linear time (1+ε)-approximation algorithm for the k-means problem for fixed k a...
Abstract—We consider k-median clustering in finite metric spaces and k-means clustering in Euclidean...
Approximation algorithms for clustering points in metric spaces is a flourishing area of re-search, ...
Recently, Bilu and Linial [6] formalized an implicit assumption often made when choosing a clusterin...
We give polynomial time approximation schemes for the problem of partitioning an input set of n poin...
Given a set of n points and their pairwise distances, the goal of clustering is to partition the po...
We present the rst constant-factor approximation algorithm for the metric k-median problem. The k-me...
International audienceWe consider the classic Facility Location, k-Median, and k-Means problems in m...
Approximation algorithms for clustering points in metric spaces is a flourishing area of research, w...