Fair clustering enjoyed a surge of interest recently. One appealing way of integrating fairness aspects into classical clustering problems is by introducing multiple covering constraints. This is a natural generalization of the robust (or outlier) setting, which has been studied extensively and is amenable to a variety of classic algorithmic techniques. In contrast, for the case of multiple covering constraints (the so-called colorful setting), specialized techniques have only been developed recently for k-Center clustering variants, which is also the focus of this paper. While prior techniques assume covering constraints on the clients, they do not address additional constraints on the facilities, which has been extensively studied in non...
We study fair center based clustering problems. In an influential paper, Chierichetti, Kumar, Lattan...
In this paper, we give tight approximation algorithms for the k-center and matroid center problems w...
We present algorithms for three geometric problems -- clustering, orienteering, and conflict-free co...
Fair clustering enjoyed a surge of interest recently. One appealing way of integrating fairness aspe...
An instance of colorful k-center consists of points in a metric space that are colored red or blue, ...
We study a variant of classical clustering formulations in the context of algorithmic fairness, know...
In this paper, we consider the colorful k-center problem, which is a generalization of the well-know...
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 study a generalization of k-center clustering, first introduced by Kavand et. al., where instead ...
Clustering is a fundamental tool in data mining. It partitions points into groups (clusters) and may...
We present approximation algorithms for some variants of center-based clustering and related problem...
Covering and clustering are two of the most important areas in the field of combinatorial optimizati...
We study the problem of k-center clustering with outliers in arbitrary metrics and Euclidean space. ...
In the Non-Uniform k-Center (NUkC) problem, a generalization of the famous k-center clustering probl...
We study fair center based clustering problems. In an influential paper, Chierichetti, Kumar, Lattan...
In this paper, we give tight approximation algorithms for the k-center and matroid center problems w...
We present algorithms for three geometric problems -- clustering, orienteering, and conflict-free co...
Fair clustering enjoyed a surge of interest recently. One appealing way of integrating fairness aspe...
An instance of colorful k-center consists of points in a metric space that are colored red or blue, ...
We study a variant of classical clustering formulations in the context of algorithmic fairness, know...
In this paper, we consider the colorful k-center problem, which is a generalization of the well-know...
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 study a generalization of k-center clustering, first introduced by Kavand et. al., where instead ...
Clustering is a fundamental tool in data mining. It partitions points into groups (clusters) and may...
We present approximation algorithms for some variants of center-based clustering and related problem...
Covering and clustering are two of the most important areas in the field of combinatorial optimizati...
We study the problem of k-center clustering with outliers in arbitrary metrics and Euclidean space. ...
In the Non-Uniform k-Center (NUkC) problem, a generalization of the famous k-center clustering probl...
We study fair center based clustering problems. In an influential paper, Chierichetti, Kumar, Lattan...
In this paper, we give tight approximation algorithms for the k-center and matroid center problems w...
We present algorithms for three geometric problems -- clustering, orienteering, and conflict-free co...