In parallel machine scheduling, we are given a set of jobs, together with a number of machines and our goal is to decide for each job, when and on which machine(s) it should be scheduled in order to minimize some objective function. Different machine models, job characteristics and objective functions result in a multitude of scheduling problems and many of them are NP-hard, even for a fixed number of identical machines. In this work, we give conditional running time lower bounds for a large number of scheduling problems, indicating the optimality of some classical algorithms. Most notably, we show that the algorithm by Lawler and Moore for $1||\sum w_jU_j$ and $Pm||C_{max}$, as well as the algorithm by Lee and Uzsoy for $P2||\sum w_jC_j$ a...
AbstractIn a recent paper [Discrete Appl. Math. 130 (2003) 449–467], Yang, Ye, and Zhang investigate...
Suppose that $n$ independent tasks are to be scheduled without preemption on an unlimited number of ...
AbstractThis paper addresses the problem of scheduling n jobs on m identical parallel machines so as...
In many scheduling applications, a large number of jobs are grouped into a comparatively small numbe...
textabstractWe address the problem of scheduling n identical jobs on m uniform parallel machines to ...
AbstractWe study the situation where a set of n jobs with release dates and equal processing times h...
We consider the classical problem of scheduling n tasks with given processing time on m identical ...
In this paper, we consider a parallel machine environment when all jobs have the same processing tim...
AbstractWe present in this paper a proof of the NP-completeness of the problem to schedule n simulta...
We address the problem of minimizing makespan on identical parallel machines. We propose new lower b...
We address the problem of minimizing makespan on identical parallel machines. We propose new lower b...
We are given a nite set of jobs of equal processing times with readiness times and tails and a set o...
We study the parallel machine scheduling problem with release dates and we consider several “min-sum...
Given a set of jobs with associated processing times, and a set of identical machines, each of which...
A recently published paper by Mokotoff presents an exact algorithm for the classical PiCmax scheduli...
AbstractIn a recent paper [Discrete Appl. Math. 130 (2003) 449–467], Yang, Ye, and Zhang investigate...
Suppose that $n$ independent tasks are to be scheduled without preemption on an unlimited number of ...
AbstractThis paper addresses the problem of scheduling n jobs on m identical parallel machines so as...
In many scheduling applications, a large number of jobs are grouped into a comparatively small numbe...
textabstractWe address the problem of scheduling n identical jobs on m uniform parallel machines to ...
AbstractWe study the situation where a set of n jobs with release dates and equal processing times h...
We consider the classical problem of scheduling n tasks with given processing time on m identical ...
In this paper, we consider a parallel machine environment when all jobs have the same processing tim...
AbstractWe present in this paper a proof of the NP-completeness of the problem to schedule n simulta...
We address the problem of minimizing makespan on identical parallel machines. We propose new lower b...
We address the problem of minimizing makespan on identical parallel machines. We propose new lower b...
We are given a nite set of jobs of equal processing times with readiness times and tails and a set o...
We study the parallel machine scheduling problem with release dates and we consider several “min-sum...
Given a set of jobs with associated processing times, and a set of identical machines, each of which...
A recently published paper by Mokotoff presents an exact algorithm for the classical PiCmax scheduli...
AbstractIn a recent paper [Discrete Appl. Math. 130 (2003) 449–467], Yang, Ye, and Zhang investigate...
Suppose that $n$ independent tasks are to be scheduled without preemption on an unlimited number of ...
AbstractThis paper addresses the problem of scheduling n jobs on m identical parallel machines so as...