References
- Affisco, J. F., Paknejad, M. J., & Nasri, F. (2002). Quality improvement and setup reduction in the joint economic lot size model. European Journal of Operational Research, 142, 497–508.
- Aslani, A., Taleizadeh, A. A., & Zanoni, S. (2017). An EOQ model with partial backordering with regard to random yield: Two strategies to improve mean and variance of yield. Computers and Industrial Engineering, 112, 379–390.10.1016/j.cie.2017.08.038
- Billington, P. J. (1987). The classic economic production quantity model with setup cost as a function of capital expenditure. Decision Science, 18(1), 25–42.10.1111/deci.1987.18.issue-1
- Cheng, T. C. E. (1991). EPQ with process capability and quality assurance considerations. Journal of Operational Research Society, 42(8), 713–720.10.1057/jors.1991.137
- Ferguson, M., Jayaraman, V., & Souza, G. C. (2007). Note: An application of the EOQ model with nonlinear holding cost to inventory management of perishables. European Journal of Operational Research, 180(1), 1–12.
- Goyal, S. K., Gunasekaran, A., Martikainen, T., & Yli-Olli, P. (1993). Integrating production and quality control policies: A survey. European Journal of Operational Research, 69, 1–13.10.1016/0377-2217(93)90085-2
- Lee, P. M. (2004). Bayesian statistics – an introduction (3rd Edition). U.S.A.: Oxford University Press.
- Moinzadeh, K., & Lee, H. L. (1987). A continuous review inventory model with constant resupply time and defective items. Naval Research Logistics, 34, 457–467.10.1002/(ISSN)1520-6750
- Nahmias, S. (1982). Perishable inventory theory: A review. Operations Research, 30(4), 680–708.
- Nasri, F., Paknejad, J., & Affisco, J. F. (2009). Lot size determination in an EOQ model with planned shortage and random defective units. Northeast Decision Sciences Institute Proceedings, pp. 403-408, on CD-ROM.
- Nasri, F., Paknejad, J., & Affisco, J. F. (2012). An analysis of flexibility and quality improvement in a quality-adjusted EOQ model with yield-adjusted stochastic lead-time. Computers and Industrial Engineering Journal, 63, 418–427.10.1016/j.cie.2012.03.019
- Paknejad, M. J., Nasri, F., & Affisco, J. F. (1995). Defective units in a continuous review (s, Q) system. International Journal of Production Research, 33(10), 2767–2777.10.1080/00207549508904844
- Paknejad, J., Nasri, F., & Affisco, J. F. (2005). Quality improvement in an inventory model with finite-range stochastic lead time. Journal of Applied Mathematics & Decision Science, 3, 177–189.
- Paknejad, J., Nasri, F., & Affisco, J. F. (2015). Yield improvement and yield variability reduction in an EOQ model with planned shortages and random yield. Computers and Industrial Engineering, 88, 386–394.10.1016/j.cie.2015.07.012
- Pal, H., Bardham, S., & Giri, B. C. (2017). Optimal replenishment policy for non-instantaneously perishable items with preservation technology and random deterioration start time. International Journal of Management Science and Engineering Management, 1–12.
- Porteus, E. L. (1985). Investing in reduced setups in the EOQ model. Management Science, 31(8), 998–1010.10.1287/mnsc.31.8.998
- Porteus, E. L. (1986). Optimal lot sizing, process quality improvement and setup cost reduction. Operations Research., 34(1), 137–144.10.1287/opre.34.1.137
- Rosenblatt, M. J., & Lee, H. L. (1986). Economic production cycles with imperfect production processes. IIE Transactions, 18(1), 48–55.10.1080/07408178608975329
- Ross, S. M. (1976). A first course in probability. New York, NY: Macmillan Publishing Co., Inc.
- Shih, W. (1980). Optimal inventory policies when stockouts result from defective products. International Journal of Production Research, 18(6), 677–686.10.1080/00207548008919699
- Silver, E. A. (1976). Establishing the reorder quantity when the amount received is uncertain. INFOR, 14(1), 32–39.
- Skellam, J. G. (1948). A probability distribution derived from the binomial distribution by regarding the probability of success as variables between the sets of trials. Journal of the Royal Statistical Society, Series, B10, 257–261.
- Weiss, H. (1982). Economic order quantity models with nonlinear holding costs. European Journal of Operational Research, 9(1), 56–60.10.1016/0377-2217(82)90010-8
- Yano, C. A., & Lee, H. L. (1995). Lot sizing with random yields: A review. Operations Research, 43(2), 311–334.10.1287/opre.43.2.311