We study the problem of constructing epsilon-coresets for the (k, z)-clustering problem in a doubling metric M(X, d). An epsilon-coreset is a weighted subset S subset of X with weight function w : S -> R->= 0, such that for any k-subset C is an element of [X](k), it holds that Sigma(x is an element of S) w(x).d(z) (x, C) is an element of (1 +/- epsilon) . Sigma(x is an element of X) d(z) (x, C).We present an efficient algorithm that constructs an epsilon-coreset for the (k, z)-clustering problem in M(X, d), where the size of the coreset only depends on the parameters k, z, epsilon and the doubling dimension ddim(M). To the best of our knowledge, this is the first efficient epsilon-coreset construction of size independent of vertical bar X v...
Recent developments in local search analysis have yielded the first polynomial-time approximation sc...
Clustering partitions a collection of objects into groups called clusters, such that similar objects...
We study the problem of k-center clustering with outliers in arbitrary metrics and Euclidean space. ...
Constructing small-sized coresets for various clustering problems has attracted significant attentio...
In this thesis we show that, for several clustering problems, we can extract a small set of points, ...
In this paper, we show that for several clustering problems one can extract a small set of points, s...
This paper considers the well-studied algorithmic regime of designing a (1+ϵ)-approximation algorith...
We study approximation algorithms for k-median clustering. We obtain small coresets for k-median clu...
Center-based clustering is a fundamental primitive for data analysis and is very challenging for lar...
Motivated by practical generalizations of the classic $k$-median and $k$-means objectives, such as c...
In this paper, we show that there exists a (k, ε)-coreset for k-median and k-means clustering of n p...
In this article, we study shape fitting problems, epsilon-coresets, and total sensitivity. We focus ...
Metric k-center clustering is a fundamental unsupervised learning primitive. Although widely used, t...
Classical clustering problems search for a partition of objects into a fixed number of clusters. In ...
International audienceWe consider the classic Facility Location, k-Median, and k-Means problems in m...
Recent developments in local search analysis have yielded the first polynomial-time approximation sc...
Clustering partitions a collection of objects into groups called clusters, such that similar objects...
We study the problem of k-center clustering with outliers in arbitrary metrics and Euclidean space. ...
Constructing small-sized coresets for various clustering problems has attracted significant attentio...
In this thesis we show that, for several clustering problems, we can extract a small set of points, ...
In this paper, we show that for several clustering problems one can extract a small set of points, s...
This paper considers the well-studied algorithmic regime of designing a (1+ϵ)-approximation algorith...
We study approximation algorithms for k-median clustering. We obtain small coresets for k-median clu...
Center-based clustering is a fundamental primitive for data analysis and is very challenging for lar...
Motivated by practical generalizations of the classic $k$-median and $k$-means objectives, such as c...
In this paper, we show that there exists a (k, ε)-coreset for k-median and k-means clustering of n p...
In this article, we study shape fitting problems, epsilon-coresets, and total sensitivity. We focus ...
Metric k-center clustering is a fundamental unsupervised learning primitive. Although widely used, t...
Classical clustering problems search for a partition of objects into a fixed number of clusters. In ...
International audienceWe consider the classic Facility Location, k-Median, and k-Means problems in m...
Recent developments in local search analysis have yielded the first polynomial-time approximation sc...
Clustering partitions a collection of objects into groups called clusters, such that similar objects...
We study the problem of k-center clustering with outliers in arbitrary metrics and Euclidean space. ...