| 參考文獻: | [1] Ardia, D., Mullen, K., Peterson, B. and Ulrich, J. (2012), DEoptim: Differential evolution optimization in R. version 2.2-1. URL http://CRAN.R-project.org/package=DEoptim.
[2] Chen, Y.K. and Chiou, K.C. (2005), “Optimal design of VSI X control charts for monitoring correlated samples,” Quality and Reliability Engineering International, 21(8), 757-768.
[3] Chen, C.H. and 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(5), 389-398.
[4] Cho, B. R. and Phillips, M. D. (1998), “Design of the optimum product specifications for S-type quality characteristics,” International Journal of Production Research, 36(2), 459-474.
[5] Chou, C. Y., Chen, C.H. and Chen, C.H. (2006b), “Economic design of variable sampling intervals T-square control charts using genetic algorithms,” Expert Systems
with Applications, 30(2), 233-242.
[6] Chou, C.Y., Chen, C.H. and Liu, H.R. (2006a), “Economic design of EWMA charts with variable sampling intervals,” Quality and Quantity, 40(6), 879-896.
[7] Chou, C.Y., Liu, H.R., Chen, C.H. and Huang, X.R. (2002), “Economic-statistical design of multivariate control charts using quality loss function,” Advanced
Manufacturing Technology, 20(12), 916-924.
[8] Duncan, A. J. (1956), “The economic design of X charts used to maintain current control of a process,” Journal of the American Statistical Association, 51(274),228-242.
[9] Duncan, A. J. (1971), “The economic design of X charts when there is a multiplicity of assignable causes,” Journal of the American Statistical Association, 66(333),107-121.
[10] Dutang, C., Goulet, V. and Pigeon, M. (2008), “actuar: An R package for actuarial science,” Journal of Statistical Software, 25(7), 1-37.
[11] Elsayed, E.A. and Chen, A. (1994), “An economic design of X control chart using quadratic loss function,” International Journal of Production Research, 32(4),
873-887.
[12] Erto, P., Pallotta, G. and Park, S. H. (2008), “An example of data technology product: a control chart for Weibull processes,” International Statistical Review, 76(2), 157-166.
[13] Feng, Q. and Kapur, K.C. (2006), “Economic development of specifications for 100% inspection based on asymmetric quality loss function,” IIE Transactions, 38(8),
659-669.
[14] Filho, J. C. S. S. and Yacoub, M. D. (2006), “Simple precise approximations to Weibull sums,” IEEE Communications Letters, 10(8), 614-616.
[15] Kapur, K.C. (1988), “An approach for development of specifications for quality improvement,” Quality Engineering, 1(1), 63-77.
[16] Kapur, K.C. and Cho, B.R. (1994), “Economic design and development of specifications,” Quality Engineering, 6(3), 401-417.
[17] Lorenzen, T. J. and Vance, L. C. (1986), “The economic design of control charts: a unified approach,” Technometrics, 28(1), 3-10.
[18] Montgomery, D. C. (1980), “The economic design of control charts: a review and literature survey,” Journal of Quality Technology, 12(2), 75-87.
[19] Panagos, M. R., Heikes, R. G. and Montgomery, D. C. (1985), “Economic design of X control charts for two manufacturing process models,” Naval Research Logistics
Quarterly, 32, 631-646.
[20] Phillips, M. D. and Cho, B. R. (1998), “An empirical approach to designing product specifications: A case study,” Quality Engineering, 11(1), 91-100.
[21] R Core Team (2012). R: A language and environment for statistical computing. R Foundation for Statistical Computing, Vienna, Austria. ISBN 3-900051-07-0, URL
http://www.R-project.org/.
[22] Taguchi, G. (1984), “The role of metrological control for quality control,” Proceedings of the International Symposium on Metrology for Quality Control in Production, 1-7.
[23] Tang, K. (1988), “Economic design of product specifications for a complete inspection plan,” International Journal of Production Research, 26(2), 203-217.
[24] Torng, C.C., Lee, P.H. and Liao, N.Y. (2009), “An economic-statistical design of double sampling X control chart,” International Journal of Production Economics,
120(2), 495-500.
[25] Vommi, V.B. and Seetala, M.S.N. (2007), “A new approach to robust economic design of control charts,” Applied Soft Computing, 7(1), 211-228.
[26] Yang, S.F. and Rahim, M.A. (2005), “Economic statistical process control for multivariate quality characteristics under Weibull shock model,” International Journal of Production Economics, 98(2), 215-226.
[27] Yu, F.J. and Hou, J.L. (2006), “Optimization of design parameters for X control charts with multiple assignable causes,” Journal of Applied Statistics, 33(3), 279-290. |
