References
- Abboud, N.E., Jaber, M.Y., & Noueihed, N.A. (2000). Economic lot sizing with the consideration of random machine unavailability time. Computers & Operations Research, 27(4), 335–351.
- Chang, H.C., & Ho, C.H. (2010). Exact closed-form solutions for “optimal inventory model for items with imperfect quality and shortage backordering”. Omega, 38(3–4), 233–237.
- Chattopadhyay, G.N., & Murthy, D.N.P. (2000). Warranty cost analysis for second-hand products. Mathematical and Computer Modelling, 31, 81–88.
- Chiang, J.H., & Yuan, J. (2001). Optimal maintenance policy for a Markovian system under periodic inspection. Reliability Engineering and System Safety, 71, 165–172.
- Chiu, S.W. (2010). Robust planning in optimization for production system subject to random machine breakdown and failure in rework. Computers & Operations Research, 37(5), 899–908.
- Chiu, Y.S.P., Wu, M.F., Chiu, S.W., & Chang, H.H. (2015). A simplified approach to the multi-item economic production quantity model with scrap, rework, and multi-delivery. Journal of Applied Research and Technology, 13(4), 472–476.
- Chung, C.J., Widyadana, G.A., & Wee, H.M. (2011). Economic production quantity model for deteriorating inventory with random machine unavailability and shortage. International Journal of Production Research, 49(3), 883–902.
- Djamaludin, I., Murthy, D.N.P., & Wilson, R.J. (1994). Quality control through lot sizing for items sold with warranty. International Journal of Production Economics, 33, 97–107.
- Harris, F. (1913). How many parts to make at once? Factory. The Magazine Of Management, 10, 135–136.
- Huang, Y.-S., Gau, W.-Y., & Ho, J.-W. (2015). Cost analysis of two-dimensional warranty for products with periodic preventive maintenance. Reliability Engineering and System Safety, 134, 51–58
- Kar, T.R., & Nachlas, J.A. (1997). Coordinated warranty and burn-in strategies. IEEE Transactions on Reliability, 46, 512–518.
- Khouja, M., & Mehrez, A. (1994). An economic production lot size model with imperfect quality and variable production rate. Journal of the Operational Research Society, 45, 1405–1417.
- Kim, H.G., & Rao, B.M. (2000). Expected warranty cost of two-attribute free-replacement warranties based on a bivariate exponential distribution. Computers & Industrial Engineering, 34, 425–434.
- Lee, A.H.I., Kang, H.Y., & Lai, C.M. (2013). Solving lot-sizing problem with quantity discount and transportation cost. International Journal of Systems Science, 44, 760–774.
- Lee, H.L., & Rosenblatt, M.J. (1987). Simultaneous determination of production cycle and inspection schedules in a production systems. Management Science, 33(9), 1125–1136.
- Lee, J.S., & Park, K.S. (1992). Joint determination of production cycle and inspection intervals in a deteriorating production system. Journal of the Operational Research Society, 42(9), 775–783.
- Liao, G.L., Chen, Y.H., & Sheu, S.H. (2009). Optimal economic production quantity policy for imperfect process with imperfect repair and maintenance. European Journal of Operational Research, 195, 348–357.
- Liao, G.L., & Sheu, S.H. (2011). Economic production quantity model for randomly failing production process with minimal repair and imperfect maintenance. International Journal of Production Economics, 130, 118–124.
- Lin, C.S., Chen, C.H., & Kroll, D.E. (2003). Integrated production-inventory models for imperfect production processes under inspection schedules. Computers & Industrial Engineering, 44, 633–650.
- Lin, D., Zuo, M.J., & Yam, R.C.M. (2000). General sequential imperfect preventive maintenance models. International Journal of Reliability, Quality and Safety Engineering, 7(3), 253–266.
- Liu, J., & Yang, J.P. (1996). Optimal lot-sizing in an imperfect production system with homogeneous reworkable jobs. European Journal of Operational Research, 91, 517–527.
- Murthy, D.N.P., & Kumar, K.R. (2000). Total product quality. International Journal of Production Economics, 67, 253–267.
- Nakagawa, T. (1988). Sequential imperfect preventive maintenance policies. IEEE Transactions on Reliability, 37(3), 295–298.
- Nakagawa, T., & Yasui, K. (1991). Periodic-replacement models with threshold levels. IEEE Transactions on Reliability, 40(3), 395–397.
- Nguyen, D.G., & Murthy, D.N.P. (1982). Optimal burn-in time to minimize cost for product sold under warranty. IIE Transactions, 14, 167–174.
- Pal, B., Sana, S.S., & Chaudhuri, K. (2013a). A mathematical model on EPQ for stochastic demand in an imperfect production system. Journal of Manufacturing Systems, 32(1), 260–270.
- Pal, B., Sana, S.S., & Chaudhuri, K. (2013b). Maximizing profits for an EPQ model with unreliable machine and rework of random defective items. International Journal of Systems Science, 44(3), 582–594.
- Pal, B., Sana, S.S., & Chaudhuri, K. (2014a). A multi-echelon production-inventory system with supply disruption. Journal of Manufacturing Systems, 33(2), 262–276.
- Pal, B., Sana, S.S., & Chaudhuri, K. (2014b). Joint pricing and ordering policy for two echelon imperfect production inventory model with two cycles. International Journal of Production Economics, 155, 229–238.
- Pham, H., & Wang, H. (1996). Imperfect maintenance. European Journal of Operational Research, 94(3), 425–438.
- Polatoglu, H., & Sahin, I. (1998). Probability distributions of cost, revenue and profit over a warranty cycle. European Journal of Operational Research, 108, 170–183.
- Porteus, E.L. (1986). Optimal lot sizing, process quality improvement and setup cost reduction. Operations Researches, 34, 137–144.
- Rosenblatt, M.J., & Lee, H.L. (1986). Economic production cycles with imperfect production process. IIE Transactions, 18, 48–55.
- Salameh, M.K., & Jaber, M.Y. (2000). Economic production quantity model for items with imperfect quality. International Journal of Production Economics, 64, 59–64.
- Sana, S.S. (2010). An economic production lot size model in an imperfect production system. European Journal of Operational Research, 201, 158–170.
- Sarkar, B., Cárdenas-Barrón, L.E., Sarkar, M., & Singgih, M.L. (2014). An economic production quantity model with random defective rate, rework process and backorders for a single stage production system. Journal of Manufacturing Systems, 33, 423–435.
- Sarkar, B., & Moon, I. (2011). An EPQ model with inflation in an imperfect production system. Applied Mathematics and Computation, 217, 6159–6167.
- Sheu, S.H., & Chen, Y.-L., Chang, C.-C., & Zhang, Z.G. (2013). Optimal number of repairs before replacement for a system subject to shocks of a non-homogeneous pure birth process. IEEE Transactions on Reliability, 62(1), 73–81.
- Sheu, S.H., Lin, Y.B., & Liao, G.L. (2005). Optimal policies with decreasing probability of imperfect maintenance. IEEE Transactions on Reliability, 54(2), 347–357.
- Singh, S.R., & Sharma, S. (2014). Optimal trade-credit policy for perishable items deeming imperfect production and stock dependent demand. International Journal of Industrial Engineering Computations, 5(1), 151–168.
- Tseng, S.T. (1996). Optimal preventive maintenance policy for deteriorating production systems. IIE Transactions, 28, 687–694.
- Tseng, S.T., Yeh, R.H., & Ho, W.T. (1998). Imperfect maintenance policies for deteriorating production systems. International Journal of Production Economics, 55, 191–201.
- Wang, C.H., & Sheu, S.H. (2003). Optimal lot sizing for products sold under free-repair warranty. International Journal of Production Research, 149, 131–141.
- Wang, C.H., & Tsai, W.C. (2012). Determining the production lot size with a heuristic inspection policy for controlling the quality of input materials and products. International Journal of Systems Science, 43, 2030–2039.
- Yun, W.Y., Lee, Y.W., & Ferreira, L. (2002). Optimal burn-in time under cumulative free replacement warranty. Reliability Engineering and System Safety, 78, 93–100.