The Uncapacitated Facility Location (UFL) problem is one of the most fundamental clustering problems: Given a set of clients $C$ and a set of facilities $F$ in a metric space $(C \cup F, dist)$ with facility costs $open : F \to \mathbb{R}^+$, the goal is to find a set of facilities $S \subseteq F$ to minimize the sum of the opening cost $open(S)$ and the connection cost $d(S) := \sum_{p \in C} \min_{c \in S} dist(p, c)$. An algorithm for UFL is called a Lagrangian Multiplier Preserving (LMP) $\alpha$ approximation if it outputs a solution $S\subseteq F$ satisfying $open(S) + d(S) \leq open(S^*) + \alpha d(S^*)$ for any $S^* \subseteq F$. The best-known LMP approximation ratio for UFL is at most $2$ by the JMS algorithm of Jain, Mahdian, and...
Clustering is a classic topic in combinatorial optimization and plays a central role in many areas, ...
This paper studies an extension of the k-median prob-lem where we are given a metric space (V, d) an...
In the k-facility location problem we are given the possible locations for a group of at m...
AbstractThe k-facility location problem is a common generalization of the facility location and the ...
We study local search algorithms for metric instances of facility location problems: the uncapacitat...
Facility Location (FL) problems are among the most fundamental problems in combinatorial optimizatio...
We present improved combinatorial approximation algorithms for the uncapacitated facility location a...
We consider the metric uncapacitated facility location problem(UFL). In this paper we modify the (1¿...
The $k$-Facility Location problem is a generalization of the classical problems $k$-Median and Facil...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2004.Includes bibliogr...
In this paper, we study approximation algorithms for several NP-hard facility location problems. We ...
Abstract. We analyze local search heuristics for the metric k-median and facility location problems....
We consider a facility-location problem that abstracts settings where the cost of serving the client...
We obtain a 1.5-approximation algorithm for the metric uncapacitated facility location (UFL) problem...
We analyze local search heuristics for the metric k-median and facility location problems. We define...
Clustering is a classic topic in combinatorial optimization and plays a central role in many areas, ...
This paper studies an extension of the k-median prob-lem where we are given a metric space (V, d) an...
In the k-facility location problem we are given the possible locations for a group of at m...
AbstractThe k-facility location problem is a common generalization of the facility location and the ...
We study local search algorithms for metric instances of facility location problems: the uncapacitat...
Facility Location (FL) problems are among the most fundamental problems in combinatorial optimizatio...
We present improved combinatorial approximation algorithms for the uncapacitated facility location a...
We consider the metric uncapacitated facility location problem(UFL). In this paper we modify the (1¿...
The $k$-Facility Location problem is a generalization of the classical problems $k$-Median and Facil...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2004.Includes bibliogr...
In this paper, we study approximation algorithms for several NP-hard facility location problems. We ...
Abstract. We analyze local search heuristics for the metric k-median and facility location problems....
We consider a facility-location problem that abstracts settings where the cost of serving the client...
We obtain a 1.5-approximation algorithm for the metric uncapacitated facility location (UFL) problem...
We analyze local search heuristics for the metric k-median and facility location problems. We define...
Clustering is a classic topic in combinatorial optimization and plays a central role in many areas, ...
This paper studies an extension of the k-median prob-lem where we are given a metric space (V, d) an...
In the k-facility location problem we are given the possible locations for a group of at m...