This thesis studies the capacitated facility location problem, in which all clients have unit demand and all facilities have integral capacity. A linear relaxation is researched, with corresponding integrality gap bounded by a constant. Recently, such a linear relaxation has been found and proven using an LP-bounding algorithm. The formulation of the relaxation and the proof were very complex and intuitively hard to understand, however. Therefore, this thesis provides a simpler, more formulation and proof. This thesis has two main contributions. First, a structured overview of all the theory prior to the construction of the relaxation is provided. To do so, the minimum knapsack problem is treated, which is a simplied version of the capacita...
Abstract We study problems that integrate buy-at-bulk network design into the classical (connected) ...
In this paper we propose a new integer programming formulation for the multilevel facility location ...
We consider a lower- and upper-bounded generalization of the classical facility location problem, wh...
I hereby declare that I am the sole author of this thesis. This is a true copy of the thesis, includ...
There has been a great deal of recent work on approximation algorithms for facility location problem...
A new methodology to solve the capacitated facility location problem (CFLP) is presented. This optim...
In the Capacitated facility location (Cfl) problem we are given a set F of facilities and a set C of...
In this research, we will focus on one variant of the problem: the capacitated facility location pro...
The capacitated facility location problem is a well known problem in combinatorial optimization and ...
AbstractWe investigate the solution of large-scale instances of the capacitated and uncapacitated fa...
In this paper, we propose and analyze a local search algorithm for the capacitated facility location...
We study problems that integrate buy-at-bulk network design into the classical (connected) facility ...
We introduce a combined facility location/network design problem in which facilities have constraini...
We study the capacitated k-facility location problem, in which we are given a set of clients with de...
In this paper we present a 1.52-approximation algorithm for the metric uncapacitated facility locati...
Abstract We study problems that integrate buy-at-bulk network design into the classical (connected) ...
In this paper we propose a new integer programming formulation for the multilevel facility location ...
We consider a lower- and upper-bounded generalization of the classical facility location problem, wh...
I hereby declare that I am the sole author of this thesis. This is a true copy of the thesis, includ...
There has been a great deal of recent work on approximation algorithms for facility location problem...
A new methodology to solve the capacitated facility location problem (CFLP) is presented. This optim...
In the Capacitated facility location (Cfl) problem we are given a set F of facilities and a set C of...
In this research, we will focus on one variant of the problem: the capacitated facility location pro...
The capacitated facility location problem is a well known problem in combinatorial optimization and ...
AbstractWe investigate the solution of large-scale instances of the capacitated and uncapacitated fa...
In this paper, we propose and analyze a local search algorithm for the capacitated facility location...
We study problems that integrate buy-at-bulk network design into the classical (connected) facility ...
We introduce a combined facility location/network design problem in which facilities have constraini...
We study the capacitated k-facility location problem, in which we are given a set of clients with de...
In this paper we present a 1.52-approximation algorithm for the metric uncapacitated facility locati...
Abstract We study problems that integrate buy-at-bulk network design into the classical (connected) ...
In this paper we propose a new integer programming formulation for the multilevel facility location ...
We consider a lower- and upper-bounded generalization of the classical facility location problem, wh...