We present approximation algorithms for some variants of center-based clustering and related problems in the fully dynamic setting, where the pointset evolves through an arbitrary sequence of insertions and deletions. Specifically, we target the following problems: $k$-center (with and without outliers), matroid-center, and diversity maximization. All algorithms employ a coreset-based strategy and rely on the use of the cover tree data structure, which we crucially augment to maintain, at any time, some additional information enabling the efficient extraction of the solution for the specific problem. For all of the aforementioned problems our algorithms yield $(\alpha+\varepsilon)$-approximations, where $\alpha$ is the best known approximat...
Center-based clustering is a pivotal primitive for unsupervised learning and data analysis. A popul...
ABSTRACT Given a dataset of points in a metric space and an integer k, a diversity maximization prob...
Given a dataset Vof points from some metric space, a popular robust formulation of the k-center clus...
We study a variant of classical clustering formulations in the context of algorithmic fairness, know...
International audienceStatic and dynamic clustering algorithms are a fundamental tool in any machine...
International audienceWe consider the classic Facility Location, k-Median, and k-Means problems in m...
Center-based clustering is a fundamental primitive for data analysis and becomes very challenging fo...
We study the problem of k-center clustering with outliers in arbitrary metrics and Euclidean space. ...
We study the F-center problem with outliers: given a metric space (X,d), a general down-closed famil...
Recent progress on robust clustering led to constant-factor approximations for Robust Matroid Center...
We introduce a novel problem for diversity-aware clustering. We assume that the potential cluster ce...
We consider the clustering with diversity problem: given a set of colored points in a metric space, ...
Fair clustering enjoyed a surge of interest recently. One appealing way of integrating fairness aspe...
AbstractTwo complications frequently arise in real-world applications, motion and the contamination ...
In this paper we give the first efficient algorithms for the $k$-center problem on dynamic graphs un...
Center-based clustering is a pivotal primitive for unsupervised learning and data analysis. A popul...
ABSTRACT Given a dataset of points in a metric space and an integer k, a diversity maximization prob...
Given a dataset Vof points from some metric space, a popular robust formulation of the k-center clus...
We study a variant of classical clustering formulations in the context of algorithmic fairness, know...
International audienceStatic and dynamic clustering algorithms are a fundamental tool in any machine...
International audienceWe consider the classic Facility Location, k-Median, and k-Means problems in m...
Center-based clustering is a fundamental primitive for data analysis and becomes very challenging fo...
We study the problem of k-center clustering with outliers in arbitrary metrics and Euclidean space. ...
We study the F-center problem with outliers: given a metric space (X,d), a general down-closed famil...
Recent progress on robust clustering led to constant-factor approximations for Robust Matroid Center...
We introduce a novel problem for diversity-aware clustering. We assume that the potential cluster ce...
We consider the clustering with diversity problem: given a set of colored points in a metric space, ...
Fair clustering enjoyed a surge of interest recently. One appealing way of integrating fairness aspe...
AbstractTwo complications frequently arise in real-world applications, motion and the contamination ...
In this paper we give the first efficient algorithms for the $k$-center problem on dynamic graphs un...
Center-based clustering is a pivotal primitive for unsupervised learning and data analysis. A popul...
ABSTRACT Given a dataset of points in a metric space and an integer k, a diversity maximization prob...
Given a dataset Vof points from some metric space, a popular robust formulation of the k-center clus...