References
- Tahera K, Chan WM, Ibrahim RN. Joint determination of process mean and production run: a review. Int J Adv Manuf Technol. 2008;39:388–400.10.1007/s00170-007-1210-x
- Sana SS, Goyal SK, Chaudhuri K. On a volume flexible inventory model for items with an imperfect production system. Int J Prod Econ. 2007a;105:64–80.
- Sana SS, Goyal SK, Chaudhuri K. An imperfect production process in a volume flexible inventory model. Int J Prod Econ. 2007b;105:548–559.10.1016/j.ijpe.2006.05.005
- Sana SS. An economic production lot size model in an imperfect production system. Eur J Oper Res. 2010a;201:158–170.10.1016/j.ejor.2009.02.027
- Sana SS. A production-inventory model in an imperfect production process. Eur J Oper Res. 2010b;200:451–464.10.1016/j.ejor.2009.01.041
- Taguchi G. Introduction to quality engineering. Tokyo: Asian Productivity Organization; 1986.
- Chen CH, Chou CY, Kan CC. Modified economic production and raw material model with quality loss for conforming product. J Ind Prod Eng. 2015a;32:196–203.10.1080/21681015.2015.1029548
- Chen CH, Khoo MBC, Chou CY, et al. Joint determination of process quality level and production run time for imperfect production process. J Ind Prod Eng. 2015b;32:219–224.10.1080/21681015.2015.1031195
- Chen CH, Chou CY, Kan CC. Economic specification limits and process mean settings by considering unequal target value and specification center. J Ind Prod Eng. 2014;31:199–205.10.1080/21681015.2014.918906
- Chen CH, Tsai WR. Modified single-vendor single-buyer supply chain model with quality loss for product. J Ind Prod Eng. 2016;33:495–500.10.1080/21681015.2015.1136703
- Chakraborty T, Giri BC, Chaudhuri KS. Production lot sizing with process deterioration and machine breakdown under inspection schedule. Omega. 2009;37:257–271.10.1016/j.omega.2006.12.001
- Darwish MA. Economic selection of process mean for single-vendor single-buyer supply chain. Eur J Oper Res. 2009;199:162–169.10.1016/j.ejor.2008.11.017
- Tahera K, Ibrahim RN, Lochert PB. The effect of non-constant process variance in determining the optimal process mean and production run of a deteriorating process. Prod Plan Control. 2010;21:36–46.10.1080/09537280903239433
- Jeang, A. Optimal parameters design and maintenance interval for a product with quality and cost considerations. Proc Inst Mech Eng B: J Eng Manuf. 2009;223:737–750.10.1243/09544054JEM1350
- Jeang A. Production order quantity for economical and quality consideration. Proc Inst Mech Eng B: J Eng Manuf. 2010a;224:1277–1294.10.1243/09544054JEM1665
- Jeang A. Optimal process capability analysis for process design. Int J Prod Res. 2010b;48:957–989.10.1080/00207540802471306
- Jeang A. Economic production order quantity and quality. Int J Prod Res. 2011;49:1753–1783.10.1080/00207540903555528
- Jeang A. Simultaneous determination of production lot size and process parameters under process deterioration and process breakdown. Omega. 2012;40:774–781.10.1016/j.omega.2011.12.005
- Jeang A. Concurrent product and process parameters determination under deterioration process. Appl Math Comput. 2013;219:9132–9141.10.1016/j.amc.2013.03.086
- Jeang A, Lin YK. Product and process parameters determination for quality and cost. Int J Syst Sci. 2014;45:2042–2054.10.1080/00207721.2012.760761
- Darwish MA, Duffuaa SO. A mathematical model for the joint determination of optimal process and sampling plan parameters. J Qual Maint Eng. 2010;16:181–189.10.1108/13552511011048913
- Roy MD, Sana SS, Chaudhuri K. An optimal shipment strategy for imperfect items in a stock-out situation. Math Comput Model. 2011;54:2528–2543.
- Darwish MA, Abdulmalek F. An integrated single-vendor single-buyer targeting problem with time-dependent process mean. Int J Logist Manage. 2012;13:51–64.
- Duffuaa SO, El-Ga’aly A. A multi-objective mathematical optimization model for process targeting using 100% inspection policy. Appl Math Model. 2013a;37:1545–1552.10.1016/j.apm.2012.04.008
- Duffuaa SO, El-Ga’aly A. A multi-objective optimization model for process targeting using sampling plans. Comput Ind Eng. 2013b;64:309–317.10.1016/j.cie.2012.10.001
- Darwish MA, Abdulmalek F, Alkhedher M. Optimal selection of process mean for a stochastic inventory model. Eur J Oper Res. 2013;226:481–490.10.1016/j.ejor.2012.11.022
- Pal B, Sana SS, Chaudhuri K. Three-layer supply chain – a production-inventory model for reworkable items. Appl Math Comput. 2012;219:530–543.
- Pal B, Sana SS, Chaudhuri K. A mathematical model on EPQ for stochastic demand in imperfect production system. J Manuf Syst. 2013a;32:260–270.10.1016/j.jmsy.2012.11.009
- Pal B, Sana SS, Chaudhuri K. Maximising profits for an EPQ model with unreliable machine and rework of random defective items. Int J Syst Sci. 2013b;44:582–594.10.1080/00207721.2011.617896
- Cárdenas-Barrón LE, Chung KJ, Treviño-Garza G. Celebrating a century of the economic order quantity model in honor of Ford Whitman Harris. Int J Prod Econ. 2014;155:1–7.10.1016/j.ijpe.2014.07.002
- Cárdenas-Barrón LE, Treviño-Garza G, Taleizadeh AA, et al. Determining replenishment lot size and shipment policy for an EPQ inventory model with delivery and rework. Math Prob Eng. 2015;1–8. Article ID 595498.10.1155/2015/595498
- Cárdenas-Barrón LE, Sana SS. Multi-item EOQ inventory model in a two-layer supply chain while demand varies with a promotional effort. Appl Math Model. 2015;39:6725–6737.10.1016/j.apm.2015.02.004
- Pasandideh SHR, Niaki STA, Nobil AH, et al. A multiproduct single machine economic production quantity model for an imperfect production system under warehouse construction cost. Int J Prod Econ. 2015;169:203–214.10.1016/j.ijpe.2015.08.004
- Nobil AH, Sedigh AHA, Cárdenas-Barrón LE. A multi-machine multi-product EPQ problem for an imperfect manufacturing system considering utilization and allocation decisions. Expert Syst App. 2016;56:310–319.10.1016/j.eswa.2016.03.015
- Pacheco-Velázquez EA, Cárdenas-Barrón LE. An economic production quantity (EPQ) inventory model with backorders considering the raw material costs. Sci Iran Trans E. 2016;23:736–746.
- Kapur KC, Wang CJ. “Economic design of specifications based on Taguchi’s concept of quality loss function,” quality: design, planning, and control. In DeVor RE, Kappor SG, editors. The Winter Annual Meeting of the American Society of Mechanical Engineers, Boston, MA. 1987. p. 23–36.
- Pan JN, Pan J. Optimization of engineering tolerance design using revised loss functions. Eng Optim. 2009;41:99–118.10.1080/03052150802347959
- Boyles RA. The Taguchi capability index. J Qual Technol. 1991;23:107–126.
- Pearn WL, Kotz S, Johnson NL. Distributional and inferential properties of process capability indices. J Qual Technol. 1992;24:216–231.
- Jeang A, Chung CP. Process capability analysis based on minimum production cost and quality loss. Int J Adv Manuf Technol. 2009;43:710–719.10.1007/s00170-008-1741-9
- Pearn WL, Wu CH. Supplier selection for multi-characteristics processes with one-sided specifications. Qual Technol Quant Manage. 2013;10:133–139.10.1080/16843703.2013.11673312
- Lee HH. The linkage of process capability without target value on the center in six sigma management. J Chin Stat Assoc. 2013;51:211–224.
- Chen CH, Chou CY, Kan CC, et al. Production quantity and specification limits settings by considering specified process capability value. J Ind Prod Eng. 2014b;31:229–237.10.1080/21681015.2014.934505
- Sarkar B, Sana SS, Chaudhuri K. Optimal reliability, production lot size and safety stock in an imperfect production system. Int J Math in Oper Res. 2010;2:467–490.10.1504/IJMOR.2010.033441