AbstractEnumerative approaches to solving optimization problems, such as branch and bound, require a subroutine that produces a lower bound on the value of the optimal solution. In the domain of scheduling problems the requisite lower bound has typically been derived from either the solution to a linear-programming (LP) relaxation of the problem or the solution to a combinatorial relaxation. In this paper we investigate, from a theoretical perspective, the relationship between several LP-based lower bounds and combinatorial lower bounds for three scheduling problems in which the goal is to minimize the average weighted completion time of the jobs scheduled.We establish a number of facts about the relationship between these different sorts o...
We consider the scheduling problem of minimizing the average weighted job completion time on a singl...
International audienceThe aim of this paper is to present lower bounds for a Multi-Skill Project Sch...
Recently there has been much progress on the design of approximation algorithms for a variety ofsche...
Enumerative approaches, such as branch-and-bound, to solving optimization problems require a subrout...
AbstractEnumerative approaches to solving optimization problems, such as branch and bound, require a...
Recently there has been much progress on the design of approximation algorithms for a variety of sch...
There has been recent success in using polyhedral formulations of scheduling problems not only to ob...
Suppose a set of njobs has to be scheduled on a single machine. which can handle no more than one jo...
This paper presents new results on lower bounds for the scheduling problem in highlevel synthesis. W...
This work reviews the most important results regarding the use of the α-point in Scheduling Theory. ...
Three characteristics encountered frequently in real-world machine scheduling are jobs released over...
It is well known that in the twentieth century, mathematical programming (MP) modeling and particula...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
We review the most recent lower bounds for the makespan minimization variant of the Resource Constra...
textabstractLagrangian relaxation is a powerful bounding technique that has been applied successfull...
We consider the scheduling problem of minimizing the average weighted job completion time on a singl...
International audienceThe aim of this paper is to present lower bounds for a Multi-Skill Project Sch...
Recently there has been much progress on the design of approximation algorithms for a variety ofsche...
Enumerative approaches, such as branch-and-bound, to solving optimization problems require a subrout...
AbstractEnumerative approaches to solving optimization problems, such as branch and bound, require a...
Recently there has been much progress on the design of approximation algorithms for a variety of sch...
There has been recent success in using polyhedral formulations of scheduling problems not only to ob...
Suppose a set of njobs has to be scheduled on a single machine. which can handle no more than one jo...
This paper presents new results on lower bounds for the scheduling problem in highlevel synthesis. W...
This work reviews the most important results regarding the use of the α-point in Scheduling Theory. ...
Three characteristics encountered frequently in real-world machine scheduling are jobs released over...
It is well known that in the twentieth century, mathematical programming (MP) modeling and particula...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
We review the most recent lower bounds for the makespan minimization variant of the Resource Constra...
textabstractLagrangian relaxation is a powerful bounding technique that has been applied successfull...
We consider the scheduling problem of minimizing the average weighted job completion time on a singl...
International audienceThe aim of this paper is to present lower bounds for a Multi-Skill Project Sch...
Recently there has been much progress on the design of approximation algorithms for a variety ofsche...