In the Non-Uniform k-Center problem we need to cover a finite metric space using k balls of different radii that can be scaled uniformly. The goal is to minimize the scaling factor. If the number of different radii is unbounded, the problem does not admit a constant-factor approximation algorithm but it has been conjectured that such an algorithm exists if the number of radii is constant. Yet, this is known only for the case of two radii. Our first contribution is a simple black box reduction which shows that if one can handle the variant of t — 1 radii with outliers, then one can also handle t radii. Together with an algorithm by Chakrabarty and Negahbani for two radii with outliers, this immediately implies a constant-factor approximation...
In this thesis we show that, for several clustering problems, we can extract a small set of points, ...
A set of k balls B_1,...,B_k in a Euclidean space is said to cover a collection of lines if every li...
We study the F-center problem with outliers: given a metric space (X,d), a general down-closed famil...
In the Non-Uniform k-Center problem we need to cover a finite metric space using k balls of differen...
In the Non-Uniform k-Center (NUkC) problem, a generalization of the famous k-center clustering probl...
The Non-Uniform k-center (NUkC) problem has recently been formulated by Chakrabarty et al. [ICALP, 2...
AbstractTwo complications frequently arise in real-world applications, motion and the contamination ...
In this paper, we consider the colorful k-center problem, which is a generalization of the well-know...
We study the parameterized complexity of the k-center problem on an given n-point set P in Rd, with ...
An instance of colorful k-center consists of points in a metric space that are colored red or blue, ...
In this paper we consider a generalization of the classical k-center problem with capacities. Our go...
Let P be a set of n points in R³. The 2-center problem for P is to find two congruent balls of minim...
We show that the asymmetric k-center problem is 34 n)-hard to approximate unless NP DTIME(n ...
We study the LowerBoundedCenter (LBC) problem, which is a clustering problem that can be viewed as a...
We present the rst constant-factor approximation algorithm for the metric k-median problem. The k-me...
In this thesis we show that, for several clustering problems, we can extract a small set of points, ...
A set of k balls B_1,...,B_k in a Euclidean space is said to cover a collection of lines if every li...
We study the F-center problem with outliers: given a metric space (X,d), a general down-closed famil...
In the Non-Uniform k-Center problem we need to cover a finite metric space using k balls of differen...
In the Non-Uniform k-Center (NUkC) problem, a generalization of the famous k-center clustering probl...
The Non-Uniform k-center (NUkC) problem has recently been formulated by Chakrabarty et al. [ICALP, 2...
AbstractTwo complications frequently arise in real-world applications, motion and the contamination ...
In this paper, we consider the colorful k-center problem, which is a generalization of the well-know...
We study the parameterized complexity of the k-center problem on an given n-point set P in Rd, with ...
An instance of colorful k-center consists of points in a metric space that are colored red or blue, ...
In this paper we consider a generalization of the classical k-center problem with capacities. Our go...
Let P be a set of n points in R³. The 2-center problem for P is to find two congruent balls of minim...
We show that the asymmetric k-center problem is 34 n)-hard to approximate unless NP DTIME(n ...
We study the LowerBoundedCenter (LBC) problem, which is a clustering problem that can be viewed as a...
We present the rst constant-factor approximation algorithm for the metric k-median problem. The k-me...
In this thesis we show that, for several clustering problems, we can extract a small set of points, ...
A set of k balls B_1,...,B_k in a Euclidean space is said to cover a collection of lines if every li...
We study the F-center problem with outliers: given a metric space (X,d), a general down-closed famil...