TY - JOUR
T1 - A two-agent single machine scheduling problem with due-window assignment and a common flow-allowance
AU - Mor, Baruch
AU - Mosheiov, Gur
N1 - Publisher Copyright:
© 2016, Springer Science+Business Media New York.
PY - 2017/5/1
Y1 - 2017/5/1
N2 - We study a single-machine scheduling model combining two competing agents and due-date assignment. The basic setting involves two agents who need to process their own sets of jobs, and compete on the use of a common processor. Our goal is to find the joint schedule that minimizes the value of the objective function of one agent, subject to an upper bound on the value of the objective function of the second agent. The scheduling measure considered in this paper is minimum total (earliness, tardiness and due-date) cost, based on common flow allowance, i.e., due-dates are defined as linear functions of the job processing times. We introduce a simple polynomial time solution for this problem (linear in the number of jobs), as well as to its extension to a multi-agent setting. We further extend the model to that of a due-window assignment based on common flow allowance.
AB - We study a single-machine scheduling model combining two competing agents and due-date assignment. The basic setting involves two agents who need to process their own sets of jobs, and compete on the use of a common processor. Our goal is to find the joint schedule that minimizes the value of the objective function of one agent, subject to an upper bound on the value of the objective function of the second agent. The scheduling measure considered in this paper is minimum total (earliness, tardiness and due-date) cost, based on common flow allowance, i.e., due-dates are defined as linear functions of the job processing times. We introduce a simple polynomial time solution for this problem (linear in the number of jobs), as well as to its extension to a multi-agent setting. We further extend the model to that of a due-window assignment based on common flow allowance.
KW - Common flow-allowance
KW - Minmax
KW - Scheduling
KW - Single machine
KW - Two agents
UR - http://www.scopus.com/inward/record.url?scp=85027952864&partnerID=8YFLogxK
U2 - 10.1007/s10878-016-0049-1
DO - 10.1007/s10878-016-0049-1
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AN - SCOPUS:85027952864
SN - 1382-6905
VL - 33
SP - 1454
EP - 1468
JO - Journal of Combinatorial Optimization
JF - Journal of Combinatorial Optimization
IS - 4
ER -