In the matroid center problem, which generalizes the k-center problem, we need to pick a set of centers that is an independent set of a matroid with rank r. We study this problem in streaming, where elements of the ground set arrive in the stream. We first show that any randomized one-pass streaming algorithm that computes a better than Delta-approximation for partition-matroid center must use Omega(r^2) bits of space, where Delta is the aspect ratio of the metric and can be arbitrarily large. This shows a quadratic separation between matroid center and k-center, for which the Doubling algorithm [Charikar et al., 1997] gives an 8-approximation using O(k)-space and one pass. To complement this, we give a one-pass algorithm for matroid center...
Maximizing a monotone submodular function under various constraints is a classical and intensively s...
Metric k-center clustering is a fundamental unsupervised learning primitive. Although widely used, t...
In this paper we investigate algorithms and lower bounds for summarization problems over a single ...
Given a dataset Vof points from some metric space, a popular robust formulation of the k-center clus...
In the k-center problem for streaming points in d-dimensional metric space, input points are given i...
Center-based clustering is a fundamental primitive for data analysis and becomes very challenging fo...
Recent progress on robust clustering led to constant-factor approximations for Robust Matroid Center...
In this paper we develop streaming algorithms for the diameter problem and the k-center clustering p...
This thesis studies clustering problems on data streams, specifically with applications to metric sp...
In this paper we develop streaming algorithms for the diameter problem and the k-center clustering p...
We study the 2-center problem with outliers in high-dimensional data streams. Given a stream of poin...
We consider the matroid median problem, wherein we are given a set of facilities with opening costs ...
Recent progress in (semi-)streaming algorithms for monotone submodular function maximization has led...
In this paper, we give tight approximation algorithms for the k-center and matroid center problems w...
In this paper we present a novel streaming algorithm for the k-center clustering problem for general...
Maximizing a monotone submodular function under various constraints is a classical and intensively s...
Metric k-center clustering is a fundamental unsupervised learning primitive. Although widely used, t...
In this paper we investigate algorithms and lower bounds for summarization problems over a single ...
Given a dataset Vof points from some metric space, a popular robust formulation of the k-center clus...
In the k-center problem for streaming points in d-dimensional metric space, input points are given i...
Center-based clustering is a fundamental primitive for data analysis and becomes very challenging fo...
Recent progress on robust clustering led to constant-factor approximations for Robust Matroid Center...
In this paper we develop streaming algorithms for the diameter problem and the k-center clustering p...
This thesis studies clustering problems on data streams, specifically with applications to metric sp...
In this paper we develop streaming algorithms for the diameter problem and the k-center clustering p...
We study the 2-center problem with outliers in high-dimensional data streams. Given a stream of poin...
We consider the matroid median problem, wherein we are given a set of facilities with opening costs ...
Recent progress in (semi-)streaming algorithms for monotone submodular function maximization has led...
In this paper, we give tight approximation algorithms for the k-center and matroid center problems w...
In this paper we present a novel streaming algorithm for the k-center clustering problem for general...
Maximizing a monotone submodular function under various constraints is a classical and intensively s...
Metric k-center clustering is a fundamental unsupervised learning primitive. Although widely used, t...
In this paper we investigate algorithms and lower bounds for summarization problems over a single ...