We consider the problem of partitioning a set of m points in the n-dimensional Euclidean space into k clusters (usually m and n are variable, while k is fixed), so as to minimize the sum of squared distances between each point and its cluster center. This formulation is usually called kmeans clustering (KMN + 00). We prove that this problem in NP-hard even for k = 2, and we consider a continuous relaxation of this discrete problem: find the k-dimensional subspace V that minimizes the sum of squared distances to V of the m points. This relaxation can be solved by computing the Singular Value Decomposition (SVD) of the m×n matrix A that represents the m points; this solution can be used to get a 2-approximation algorithm for the original prob...
The Johnson-Lindenstrauss lemma states that n points in a high dimensional Hilbert space can be embe...
Given a set of n points and their pairwise distances, the goal of clustering is to partition the po...
We consider the problem of partitioning the nodes of a complete edge weighted graph into {kappa} clu...
We consider the problem of partitioning a set of m points in the n-dimensional Euclidean space into ...
We consider the problem of dividing a set of m points in Euclidean n-space into k clusters (m, n are...
. A finite new algorithm is proposed for clustering m given points in n-dimensional real space into ...
We address the problem of partitioning a set of n points into clusters, so as to minimize the sum, o...
Abstract. We study the design of local algorithms for massive graphs. A local graph algorithm is one...
One of the fundamental clustering problems is to assign n points into k clusters based on the minima...
We introduce the ratio-cut polytope defined as the convex hull of ratio-cut vectors corresponding to...
In k-Clustering we are given a multiset of n vectors X subset Z^d and a nonnegative number D, and we...
Introduction Clustering is an important problem, with applications in areas such as data mining and...
We study a suitable class of well-clustered graphs that admit good k-way partitions and present the ...
The aim of this paper is to design an algorithm based on nonsmooth optimization techniques to solve ...
AbstractWe study the problem of clustering points in a metric space so as to minimize the sum of clu...
The Johnson-Lindenstrauss lemma states that n points in a high dimensional Hilbert space can be embe...
Given a set of n points and their pairwise distances, the goal of clustering is to partition the po...
We consider the problem of partitioning the nodes of a complete edge weighted graph into {kappa} clu...
We consider the problem of partitioning a set of m points in the n-dimensional Euclidean space into ...
We consider the problem of dividing a set of m points in Euclidean n-space into k clusters (m, n are...
. A finite new algorithm is proposed for clustering m given points in n-dimensional real space into ...
We address the problem of partitioning a set of n points into clusters, so as to minimize the sum, o...
Abstract. We study the design of local algorithms for massive graphs. A local graph algorithm is one...
One of the fundamental clustering problems is to assign n points into k clusters based on the minima...
We introduce the ratio-cut polytope defined as the convex hull of ratio-cut vectors corresponding to...
In k-Clustering we are given a multiset of n vectors X subset Z^d and a nonnegative number D, and we...
Introduction Clustering is an important problem, with applications in areas such as data mining and...
We study a suitable class of well-clustered graphs that admit good k-way partitions and present the ...
The aim of this paper is to design an algorithm based on nonsmooth optimization techniques to solve ...
AbstractWe study the problem of clustering points in a metric space so as to minimize the sum of clu...
The Johnson-Lindenstrauss lemma states that n points in a high dimensional Hilbert space can be embe...
Given a set of n points and their pairwise distances, the goal of clustering is to partition the po...
We consider the problem of partitioning the nodes of a complete edge weighted graph into {kappa} clu...