References
- Abdul-Kader, W., Ganjavi, O., & Solaiman, A. (2010). An integrated model for optimization of production and quality costs. International Journal of Production Research, 48, 7357–7370.
- Ahamad, S., Alatefi, M., Alkahtani, M., Anwar, S., Sharaf, M., & Abdollahian, M. (2019). Bibliometric analysis for process capability research. Quality Technology and Quantitative Management, 16, 459–477.
- Boyles, R. A. (1991). The Taguchi capability index. Journal of Quality Technology, 23, 107–126.
- Chan, L. K., Cheng, S. W., & Spring, F. A. (1988). A new measure of process capability:. Journal of Quality Technology, 30, 162–175.
- Chase, K. W. (1990). Least cost tolerance allocation for mechanical assemblies with automated process selection. Manufacturing Review, 3, 49–59.
- Chen, C. H. (2004). Determining the optimum process mean based on asymmetric quality loss function and rectifying inspection plan, International Engineering Management Conference (pp. 1080–1084), Singapore.
- Chen, C. H. (2005). Rectifying inspection plans applied in the determination of the optimum process mean. International Journal of Information and Management Sciences, 16, 85–95.
- Chen, C. H. (2006a). The optimum selection of imperfect quality economic manufacturing quantity and process mean by considering quadratic quality loss function. Journal of the Chinese Institute of Industrial Engineers, 23, 12–19.
- Chen, C. H. (2006b). The modified Pulak and Al-sultan’s model for determining the optimum process parameters. Communications in Statistics— Theory and Methods, 35, 1767–1778.
- Chen, C. H. (2010). A note on some modified Pulak and Al-Sultan’s model. Journal of Applied Statistics, 37, 461–472.
- Chen, C. H., & Chou, C. Y. (2018). Economic design of product and process parameters under the specified process capability index. Quality Technology and Quantitative Management, 15, 686–701.
- Chen, C. H., Chou, C. Y., & Kan, C. C. (2014a). Economic specification limits and process mean settings by considering unequal target value and specification center. Journal of Industrial and Production Engineering, 31, 199–205.
- Chen, C. H., Chou, C. Y., & Kan, C. C. (2015a). Modified economic production and raw material model with quality loss for conforming product. Journal of Industrial and Production Engineering, 32, 196–203.
- Chen, C. H., Chou, C. Y., Kan, C. C., & Khoo, M. B. C. (2014b). Production quantity and specification limits settings by considering specified process capability value. Journal of Industrial and Production Engineering, 31, 229–237.
- Chen, C. H., & Khoo, M. B. C. (2008). Joint determination of optimum process mean and economic specification limits for rectifying inspection plan with inspection error. Journal of the Chinese Institute of Industrial Engineers, 25, 389–398.
- Chen, C. H., Khoo, M. B. C., Chou, C. Y., & Kan, C. C. (2015b). Joint determination of process quality level and production run time for imperfect production process. Journal of Industrial and Production Engineering, 32, 219–224.
- Chen, C. H., & Lai, M. T. (2007a). Economic manufacturing quantity, optimum process mean, and economic specification limits setting under the rectifying inspection plan. European Journal of Operational Research, 183, 336–344.
- Chen, C. H., & Lai, M. T. (2007b). Determining the optimum process mean based on quadratic quality loss function and rectifying inspection plan. European Journal of Operational Research, 182, 755–763.
- Chen, C. H., & Tsai, C. H. (2015). The modified economic manufacturing quantity model based on inspection error, quality loss, and shortage. Journal of Information & Optimization Sciences, 36, 511–531.
- Chen, C. H., & Tsai, W. R. (2016). Modified single-vender single-buyer supply chain model with quality loss for product. Journal of Industrial and Production Engineering, 33, 495–500.
- Chen, J. M., & Tsou, J. C. (2003). An optimal design for process quality improvement: Modeling and application. Production Planning & Control, 14, 603–612.
- Chuang, C. J., & Wu, C. W. (2018). Optimal process mean and quality improvement in a supply chain model with two-part trade credit based on Taguchi loss function. International Journal of Production Research, 56, 5234–5248.
- Chuang, C. J., & Wu, C. W. (2019). Determining optimal process mean and quality improvement in a profit—maximization supply chain model. Quality Technology and Quantitative Management, 16, 154–169.
- Darwish, M. A. (2009). Economic selection of process mean for single-vendor single-buyer supply chain. European Journal of Operational Research, 199, 162–169.
- Darwish, M. A., & Abdulmalek, F. (2012). An integrated single-vendor single-buyer targeting problem with time-dependent process mean. International Journal of Logistics and Management, 13, 51–64.
- Darwish, M. A., Abdulmalek, F., & Alkhedher, M. (2013). Optimal selection of process mean for a stochastic inventory model. European Journal of Operational Research, 226, 481–490.
- Darwish, M. A., & Duffuaa, S. O. (2010). A mathematical model for the joint determination of optimal process and sampling plan parameters. Journal of Quality in Maintenance Engineering, 16, 181–189.
- Duffuaa, S. O., & El-Ga’aly, A. (2013a). A multi-objective mathematical optimization model for process targeting using 100% inspection policy. Applied Mathematical Modelling, 37, 1545–1552.
- Duffuaa, S. O., & El-Ga’aly, A. (2013b). A multi-objective optimization model for process targeting using sampling plans. Computers & Industrial Engineering, 64, 309–317.
- Duffuaa, S. O., & El-Ga’aly, A. (2017). A multi-objective optimization model for process targeting with inspection errors using 100% inspection. International Journal of Advanced Manufacturing Technology, 88, 2679–2692.
- Feng, Q., & Kapur, K. C. (2006a). Economic development of specifications for 100% inspection based on asymmetric quality loss functions. IIE Transactions, 38, 659–669.
- Feng, Q., & Kapur, K. C. (2006b). Economic design of specifications for 100% inspection with imperfect measurement systems. Quality Technology & Quantitative Management, 3, 127–144.
- Ganeshan, R., Kulkarni, S., & Boone, T. (2001). Production economics and process quality: A Taguchi perspective. International Journal of Production Economics, 71, 343–350.
- Hong, J. D., Xu, S. H., & Hayya, J. C. (1993). Process quality improvement and setup reduction in dynamic lot-sizing. International Journal of Production Research, 31, 2693–2708.
- Jeang, A. (1994). Tolerance design: Choosing optimal tolerance specification in the design machined parts. Quality and Reliability Engineering International, 10, 27–35.
- Jeang, A. (2010a). Production order quantity for economical and quality consideration. Proceedings of the Institution of Mechanical Engineers, Part B: Journal of Engineering Manufacture, 224, 1277–1295. pli.
- Jeang, A. (2010b). Optimal process capability analysis for process design. International Journal of Production Research, 48, 959–989.
- Jeang, A. (2011a). Simultaneous determination of production lot size and process parameters under process deterioration and process breakdown. Omega, 40, 774–781.
- Jeang, A. (2011b). Economic production order quantity and quality. International Journal of Production Research, 49, 1753–1783.
- Jeang, A., & Lin, Y. K. (2014). Product and process parameters determination for quality and cost. International Journal of Systems Science, 45, 2042–2054.
- Kapur, K. C. (1988). An approach for development of specifications for quality improvement. Quality Engineering, 1, 63–77.
- Kapur, K. C., & Cho, B. R. (1994). Economic design and development of specifications. Quality Engineering, 6, 401–417.
- Kapur, K. C., & Cho, B. R. (1996). Economic design of specification region for multiple quality characteristics. IIE Transactions, 28, 237–248.
- Kapur, K. C., & Wang, C. J. (1987). Economic design of specifications based on Taguchi’s concept of quality loss function. In R. E. DeVor & S. G. Kappor (Eds.), Quality: Design, planning, and control (pp. 23–36). Boston, U.S.A.: The Winter Annual Meeting of the American Society of Mechanical Engineers.
- Lee, H. H. (2013). The linkage of process capability without target value on the center in six sigma management. Journal of the Chinese Statistical Association, 51, 211–224.
- Nezhad, M. S. F., & Farsani, Z. D. (2018). Determining the optimum process mean in a two-stage production system based on conforming run length sampling method. Quality Technology and Quantitative Management, 15, 749–757.
- Pearn, W. L., Tai, Y. T., & Tseng, S. C. (2019). Analytical closed-form solution for multiple line supplier selection problem. Quality Technology and Quantitative Management, 16, 377–388.
- Pulak, M. F. S., & Al-Sultan, K. S. (1996). The optimum targeting for a single filling operation with rectifying inspection. Omega, 24, 727–733.
- Rahim, M. A., & Tuffaha, F. (2004). Integrated model for determining the optimal initial settings of the process mean and optimal production run assuming quadratic loss functions. International Journal of Production Research, 42, 3281–3300.
- Shin, S., Kongsuwon, P., & Cho, B. R. (2010). Development of the parametric tolerance modeling and optimization schemes and cost-effective solutions. European Journal of Operational Research, 207, 1728–1741.
- Sower, V. E., Motwani, J., & Savoie, M. J. (1993, September). Are acceptance sampling and SPC complementary or incompatible? Quality Progress, 85–89.
- Taguchi, G. (1986). Introduction to quality engineering. Tokyo: Asian Productivity Organization.
- Tsou, J. C. (2006). Decision-making on quality investment in a dynamic lot sizing production system. International Journal of Systems Science, 37, 463–475.
- Yu, H. F., & Chen, Y. M. (2018). An integrated inventory model for items with acceptable defective items under warranty and quality improvement investment. Quality Technology and Quantitative Management, 15, 702–715.