Article ID: | iaor20031348 |
Country: | United Kingdom |
Volume: | 30 |
Issue: | 1 |
Start Page Number: | 1 |
End Page Number: | 17 |
Publication Date: | Jan 2003 |
Journal: | Computers and Operations Research |
Authors: | Sheu S.H., Wang Chih-Hsiung |
Keywords: | inspection, markov processes |
Lee and Park examine the effects of an imperfect production process on the optimal production-inventory policy. They consider an imperfect production process which can go out of control after an exponentially distributed production time and then produce some proportion of defective items. The defective item cost is equivalent to the reworking cost and the warranty cost. Some maintenance-inspection mechanisms are introduced to monitor and restore the process to enhance process reliability and thereby lower the number of defective items produced. However, in many situations, a deteriorating production system possesses an increasing failure rate. In general, such a process will not be as good as new after maintenance but will be younger than its real age. Besides, Lee and Park did not investigate the possibility of imperfect inspection based on consideration of type I and and type II errors. In this paper, we consider the effects of general time to shift distributions, two types of process inspection errors and general repair policy on the optimal production/inspection/maintenance policy. A mathematical model representing the expected average cost is developed using a Markov chain to jointly determine the production cycle, process inspection intervals, and maintenance level. An optimal production/inspection/maintenance policy is determined by minimizing the expected average cost. A numerical example is given to illustrate the use of the method. Based on this proposed Markov structure model, some process-related assumptions such as maintenance that can cause the system to go out of control and that the random results of general repairs can also be easily relaxed, and they are described in the section of model extensions. An extended production–maintenance model for a deteriorating production system is established.