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一、中文部分
1.王孔政、褚志鵬(民96),供應鏈管理,台北:華泰。
2.李茂興、黃敏裕、蔡宏明譯(民87),Nigel S.; Stuart C.; Chri Nigel S.; Stuart C.; Christine H.; Alan H.; Robert J.著,生產與作業管理(下),台北:弘智文化。
3.吳亞穎、陳維中譯(民96),Sunil Chopra & Peter Meindl著,供應鏈管理,第三版,台北:臺灣培生教育。
4.姚志宏(民91),有關退化性物品的存貨模式-考慮物品時便退化率及完全欠撥,南台科技大學工業管理研究所碩士論文。
5.喬懷恩、蘇玲慧、黃惠民(民96),考量時間限制與不良品之缺貨E.O.Q模式,先進工程學刊,第1期,21-26頁。
6.蔡依齡(民91),允許部分欠撥下不完美生產系統之經濟批量,真理大學管理科學研究所碩士論文。
7.鄭聖宏(民92),生產率、需求率皆與時間有關之退化性產品生產存貨模型,國立台灣科技大學工業管理系碩士論文。
二、英文部分
1.Anderson, D.R, Sweeney D.J.& Williams, T.A. (1985), An introduction to management science : quantitative approaches to decision making, South- Western College Publishing, Cincinnati, Ohio.
2.Cardenas-Barron, L.P. (2001), The economic production quantity (E.P.Q) with shortage derived algebraically, International Journal of Production Economics, Vol.70, pp.289-292.
3.Chang, H.C.(2004), A note on the E.P.Q model with shortages and variable lead time, Information and Management Sciences, Vol.15, pp.61-67.
4.Chang, C.T.(2004), An E.O.Q model with deteriorating items under inflation when supplier credits linked to order quantity, International Journal of Production Economics, Vol.88, No.3, pp.307-316.
5.Chang, H.J. & Dye, C.Y.(1999), An E.O.Q model for deteriorating items with exponential time-varying demand and partial backlogging, Information and Management Sciences, Vol. 10, pp.1-11.
6.Chen, M.S. & Lan, C.H.(2001), The maximal profit flow model in designing multiple-production-line system with obtainable resource capacity, International Journal of Production Economics, Vol.70, No.2, pp.176-184.
7.Chiang, C. & Gutierrez, G.J.(1996), A periodic review inventory system with two supply modes, European Journal of Operational Research , Vol. 94, No.3, pp. 527-547.
8.Chu, P., Yang, K. L., Liang, S. K. & Niu, T.(2004), Note on inventory model with a mixture of back orders and lost sales, European Journal of Operational Research, Vol. 159, pp.470-475.
9.Chung, K. J. & Tsai, S. F.(1997), An algorithm to determine the E.O.Q for deteriorating items with shortage and a linear trend in demand, International Journal of Production Economics, Vol.51, pp.215-221.
10.Chung, K.J. & Lin, C.N.(2001), Optimal inventory replenishment models for deteriorating items taking account of time discounting, Computers and Operations Research, Vol.28, No.1, pp.67-83.
11.Dye, C.Y. & Liang, Y.(2005), An E.O.Q model for perishable items under stock-dependent selling rate and time-dependent partial backlogging, European Journal of Operational Research, Vol.163, No.3, pp.776-783.
12.Dye, C.Y.; Ouyang, L.Y. & Hsieh, T.P.(2007), Deterministic inventory model for deteriorating items with capacity constraint and time-proportional backlogging rate, European Journal of Operational Research, Vol.178, No.3, pp.789-807.
13.Eroglu, A. & Ozdemir, G.(2007), An economic order quantity model with defective items and shortages, International Journal of Production Economics, Vol.106, No.2, pp.544-549.
14.Fleisch, E. & Tellkamp, C.(2005), Inventory inaccuracy and supply chain performance: a simulation study of a retail supply chain, International Journal of Production Economics, Vol. 95, No.3, pp. 373-385.
15.Geetha, K.V. & Uthayakumar, R.(2010), Economic design of an inventory policy for non-instantaneous deteriorating items under permissible delay in payments, Journal of Computational and Applied Mathematics, Vol.233, No.10, pp.2492-2505.
16.Geraldine, S. & Yves, P.(2010), An integrated model for warehouse and inventory planning, European Journal of Operational Research, Vol.204, No.1, pp. 35-50.
17.Grubbstrom, R.W.(1996), Material Requirements Planning and Manufacturing Resource Planning, in: M. Warner (Ed.), International Encyclopedia of Business and Management.
18.Grubbstrom, R.W. & Erdem, A.(1999), The E.O.Q with backlogging derived without derivatives, International Journal of Production Economics, Vol.59, pp.529-530.
19.Hadley, G. & Whitin(1963), T.M., Analysis of Inventory Systems, Prentice-Hall, New Jersey.
20.Hoberg, K.; Bradley,J.R. & Thonemann, U.W.(2007), Analyzing the effect of the inventory policy on order and inventory variability with linear control theory, European Journal of Operational Research, Vol.176, No.3, pp. 1620-1642.
21.Hou, K.L.(2006 ), An inventory model for deteriorating items with stock-dependent consumption rate and shortages under inflation and time discounting, European Journal of Operational Research, Vol.168, No.2, pp. 463-474.
22.Hsieh, T.P.; Dye, C.Y. & Ouyang, L.Y.(2010), Optimal lot size for an item with partial backlogging rate when demand is stimulated by inventory above a certain stock level, Mathematical and Computer Modelling, Vol.51, No.1-2, pp.13-32.
23.Hsin, R.; Wu, M.Y. & Wee, H.M.(2003), Integrated inventory model for deteriorating items under a multi-echelon supply chain environment, International Journal of Production Economics, Vol.86, No.2, pp.155-168.
24.Huang, Y.F.(2007), Economic order quantity under conditionally permissible delay in payments, European Journal of Operational Research, Vol.176, No.2, pp.911-924.
25.Jan de Vries(2007), Diagnosing inventory management systems: An empirical evaluation of a conceptual approach, International Journal of Production Economics, Vol.108, No1-2, pp. 63-73.
26.Johnson, L.A. & Montgomery, D.C.(1974), Operations Research in Production Planning, Scheduling, and Inventory Control, John Wiley, New York.
27.Kogan, k. & Levner, E. (1998), A polynomial algorithm for scheduling small-scale manufacturing cells served by multiple robots, Comput Oper Res 25(1), pp.53-62.
28.Liao, J.J.(2008), An E.O.Q model with noninstantaneous receipt and exponentially deteriorating items under two-level trade credit, International Journal of Production Economics, Vol.113, No.2, pp.852-861.
29.Lodree, E.J.(2007), E.O.Q revisited: The case of unequal and integral order quantities, International Journal of Production Economics, Vol.105, No.2, pp.580-590.
30.Maddah, B. & Jaber, M.Y.(2008), Economic order quantity for items with imperfect quality: Revisited, International Journal of Production Economics, Vol.112, No.2, pp.808-815.
31.Manna, S.K. & Chaudhuri, K.S.(2006), An E.O.Q model with ramp type demand rate, time dependent deterioration rate, unit production cost and shortages, European Journal of Operational Research, Vol.171, No.2, pp.557-566.
32.Mazdeh, M.M.; Zaerpour, F.; Zareei, A. & Hajinezhad, A.(2010), Parallel machines scheduling to minimize job tardiness and machine deteriorating cost with deteriorating jobs, Applied Mathematical Modelling, Vol.34, No.6, pp.1498-1510.
33.Rardin, R.L.(1998), Optimization in Operations Research, Prentice Hall, London.
34.Ronal, R.; Yang, G.K. & Chu, P.(2004), Technical note: the E.O.Q and E.P.Q models with shortage derived without derivatives, International Journal of Production Economics, Vol.92, pp.197-200.
35.Roy, A.; Maiti,M.K.; Kar, S. & Maiti, M.(2007), Two storage inventory model with fuzzy deterioration over a random planning horizon, Mathematical and Computer Modelling, Vol.46, No.11-12, pp.1419-1433
36.Roy, T.K. & Maiti, M.(1997), A fuzzy E.O.Q model with demand-dependent unit cost under limited storage capacity, European Journal of Operational Research, Vol.99, No.2, pp.425-432.
37.Sarker, B. R. & Coates, E. R.(1997), Manufacturing setup cost reduction under variable lead time and finite opportunities for investment, International Journal of Production Economics, Vol.49, pp.237-247.
38.Silver, E.A.; Pake D.F. & Peterson R.(1998), Inventory Management and Production Planning and Scheduling, John Wiley, New York.
39.Skouri, K. & Papachristos, S.(2003), Optimal stopping and restarting production times for an E.O.Q model with deteriorating items and time-dependent partial backlogging, International Journal of Production Economics, Vol.81-82, pp.525-531.
40.Taha, H.A.(1995), Operations Research. Prentice Hall, Singapore.
41.Tsao, Y.C & Sheen, G.J.(2008), Dynamic pricing, promotion and replenishment policies for a deteriorating item under permissible delay in payments, Computers and Operations Research, Vol.35, No.11, pp.3562-3580.
42.Wang, S.P.(2002), An inventory replenishment policy for deteriorating items with shortages and partial backlogging, Computers and Operations Research, Vol.29, No.14, pp. 2043-2051.
43.Wang, X. & Edwin Cheng, T.C.(2003), Single-machine scheduling with deteriorating jobs and learning effects to minimize the make span, European Journal of Operational Research, Vol.178, No.1, pp.57-70.
44.Wee, H. M.(1995), A deterministic lot-size inventory model for deteriorating items with shortages and a declining market, Computers and Operations Research, Vol.22, pp.345-356.
45.Wen, Y.(2005), Understanding the inventory cycle, Journal of Monetary Economics, Vol.52, No.8, pp. 1533-1555.
46.Wu, C.C. & Lee, W.C.(2003), Scheduling linear deteriorating jobs to minimize makes pan with an availability constraint on a single machine, Information Processing Letters, Vol.87, No.2, pp.89-93.
47.Zhou, Y.W., Lau, H. S. & Yang, S. L.(2003), A new variable production scheduling strategy for deteriorating items with time-varying demand and partial lost sale, Computers and Operations Research, Vol.30, pp. 1753-1776.
48.Zhou, Y.W., Lau, H.S & Yang, S.L.(2004), A finite horizon lot-sizing problem with time-varying deterministic demand and waiting-time-dependent partial backlogging, International Journal of Production Economics, Vol.91, No.2, pp.109-119.
三、網址部分
1.美國營運管理協會(Association for Operations Management-Advancing Productivity, Innovation, and Competitive Success)(http://www.apics.org/default.htm)。
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