TY - JOUR
T1 - Discrete and continuous time representations and mathematical models for large production scheduling problems
T2 - A case study from the pharmaceutical industry
AU - Stefansson, Hlynur
AU - Sigmarsdottir, Sigrun
AU - Jensson, Pall
AU - Shah, Nilay
PY - 2011/12/1
Y1 - 2011/12/1
N2 - The underlying time framework used is one of the major differences in the basic structure of mathematical programming formulations used for production scheduling problems. The models are either based on continuous or discrete time representations. In the literature there is no general agreement on which is better or more suitable for different types of production or business environments. In this paper we study a large real-world scheduling problem from a pharmaceutical company. The problem is at least NP-hard and cannot be solved with standard solution methods. We therefore decompose the problem into two parts and compare discrete and continuous time representations for solving the individual parts. Our results show pros and cons of each model. The continuous formulation can be used to solve larger test cases and it is also more accurate for the problem under consideration.
AB - The underlying time framework used is one of the major differences in the basic structure of mathematical programming formulations used for production scheduling problems. The models are either based on continuous or discrete time representations. In the literature there is no general agreement on which is better or more suitable for different types of production or business environments. In this paper we study a large real-world scheduling problem from a pharmaceutical company. The problem is at least NP-hard and cannot be solved with standard solution methods. We therefore decompose the problem into two parts and compare discrete and continuous time representations for solving the individual parts. Our results show pros and cons of each model. The continuous formulation can be used to solve larger test cases and it is also more accurate for the problem under consideration.
KW - Mixed integer linear programming
KW - Production
KW - Scheduling
KW - Time representations
UR - http://www.scopus.com/inward/record.url?scp=80051785207&partnerID=8YFLogxK
U2 - 10.1016/j.ejor.2011.06.021
DO - 10.1016/j.ejor.2011.06.021
M3 - Article
AN - SCOPUS:80051785207
SN - 0377-2217
VL - 215
SP - 383
EP - 392
JO - European Journal of Operational Research
JF - European Journal of Operational Research
IS - 2
ER -