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REFERENCES
1. Abad, P.L. (1996), “Optimal pricing and lot-sizing under conditions of
perishability and partial backlogging”, Management Science, 42(8), 1093-1104.
2. Abad, P.L. (2000-a), “Optimal price and order size for a reseller under partial
backordering”, Computers & Operations Research (C.O.R.), 28(1), 53-65.
3. Abad, P.L. (2000-b), “Optimal lot size for a perishable good under conditions of
finite production and partial backordering and lost sale”, Computers & Industrial
Engineering (C.I.E.), 38(4), 457-465.
4. Abad, P.L. (2001), “Optimal price and order size for a reseller under partial
backordering”, C.O.R.., 28, 53-65.
5. Aggarwal, S.P. (1978), “A note on an order level inventory model for a system
with constant rate of deterioration”, Opsearch, 15, 184-187.
6. Aggarwal, S.P. and Jaggi, C.K. (1989), “Ordering policy for decaying
inventory”, International Journal of System Science (I.J.S.S.), 20, 151-155.
7. Aggarwal, S.P. and Jaggi, C.K. (1995), “Ordering policies of deteriorating items
under permissible delay in payments”, Journal of Operational Research Society
(J.O.R.S.), 46, 658-662.
2
8. Aggarwal, S.P. and Jain, V. (2001), “Optimal inventory management for
exponentially increasing demand with deterioration”, International Journal of
Management and Systems (I.J.M.S.), 17(1), 1-10.
9. Axsater, S. and Zhang, W.F. (1999), “A joint replenishment policy for multi-
echelon inventory control”, I.J.P.E., 59, 243-250.
10. Baker, R.C. and Urban, T.L. (1988), “A deterministic inventory system with an
inventory level dependent demand rate”, J.O.R.S., 39, 823-831.
11. Balkhi, Z.T. (2001), “On a finite horizon production lot size inventory model for
deteriorating items: an optimal solution”, E.J.O.R., 132(1), 210-223.
12. Balkhi, Z.T. and Benkherouf, L. (1996), “A production lot size inventory
model for deteriorating items and arbitrary production and demand rate”,
E.J.O.R., 92, 302-309.
13. Balkhi, Z.T. and Benkherouf, L. (2004), “On an inventory model for
deteriorating items with stock dependent and time varying demand rates”,
Computers & Operations Research, 31, 223- 240.
14. Benkherouf, L. (1997), “A deterministic order level inventory model for
deteriorating items with two storage facilities”, I.J.P.E., 48 (2), 167–175.
3
15. Bhunia, A.K. and Maiti, M. (1998), “A two-warehouse inventory model for
deteriorating items with a linear trend in demand and shortages”, J.O.R.S., 49 (3),
287–292.
16. Bierman, H.J. and Thomas, J. (1977), “Inventory decisions under inflationary
conditions”, Decision Sciences, 8(1), 151-155.
17. Bose, S., Goswami, A., Chaudhuri, K.S. (1995), “An EOQ model for
deteriorating items with linear time dependent demand rate and shortage under
inflation and time discounting”, J.O.R.S., 46, 777-782.
18. Buzacott, J.A. (1975), “Economic order quantities with inflation”, Operational
Research Quarterly, 26, 553-558.
19. Chang, H.J. and Dye, C.Y. (1999), “An EOQ model for deteriorating items with
time varying demand and partial backlogging”, J.O.R.S., 50(11), 1176-1182.
20. Chang, H.J. and Dye, C.Y. (2001), “An inventory model for deteriorating items
with partial backlogging and permissible delay in payments”, I.J.S.S., 32, 345-
352.
21. Chang, C.T., Ouyang, L.Y. and Teng, J.T. (2003), “An EOQ model for
deteriorating items under supplier credits linked to the ordering quantity”,
A.M.M., 27, 983-996.
4
22. Chang, C.T. (2004), “An EOQ model with deteriorating items under inflation
when supplier credits linked to order quantity”, I.J.P.E., 88, 307-316.
23. Chang, C.T., Goyal, S. K. and Teng, J.T. (2006-a), “On an EOQ model for
perishable items under stock-dependent selling rate and time-dependent partial
backlogging”, E.J.O.R., 174(2), 923-929.
24. Chang, H.J., Teng, J.T., Ouyang, L.Y. and Dye, C.Y. (2006-b), “Retailer’s
optimal pricing and lot-sizing policies for deteriorating items with partial
backlogging”, E.J.O.R., 168(1), 51-64.
25. Chapman, C.B., Ward, S.C., Cooper, D.F. and Page, M.J. (1984), “Credit
policy and inventory control”, J.O.R.S., 15(12), 1055-1065.
26. Chapman, C.B. and Ward, S.C. (1988), “Inventory control and trade credit - a
further reply”, J.O.R.S., 39(2), 219-220.
27. Chen. J.M. (1998), “An inventory model for deteriorating items with time-
proportional demand and shortages under inflation and time discounting”, I.J.P.E.,
55 (1), 21-30.
28. Chen, L.H. and Kang, F.S. (2007), “Integrated vendor-buyer cooperative
inventory models with permissible delay in payments”, E.J.O.R, 183 (2), 658-673.
5
29. Chern, M.S., Yang, H.L., Teng, J.T. and Papachristos, S. (2008), “Partial
backlogging inventory lot-size models for deteriorating models with
fluctuating demand under inflation”, E.J.O.R., 191 (1), 125-139.
30. Chu, P. and Chung, K.J. (2004), “The sensitivity of the inventory model with
partial backorders”, E.J.O.R., 152, 289-295.
31. Chung, K.J. (2000), “The inventory replenishment policy for deteriorating items
under permissible delay in payments”, Opsearch, 37(4), 267-281.
32. Chung, K.J., Huang, Y.F. and Huang, C.K. (2002), “The replenishment
decision for EOQ inventory model under permissible delay in payments”,
Opsearch, 39(5 & 6), 327-340.
33. Chung, K.J. and Huang, Y.F. (2003), “The optimal cycle time for EPQ
inventory model under permissible delay in payments”, International Journal of
Production Economics, 84, 3, 307-318.
34. Chung, K.J. and Huang, Y.F. (2004), “Optimal replenishment policies for EOQ
inventory model with limited storage capacity under permissible delay in
payments”, Opsearch 41(1), 16-34.
35. Chung, K.J. and Huang, T.S. (2005), “The optimal cycle time for deteriorating
items under permitted delay of payment”, Journal of Statistics and Management
Systems (J.S.M.S,), 8, 85-101.
6
36. Chung, K.J. and Liao, J.J. (2004), “Lot sizing decision under trade credit
depending on the ordering quantity”, C.O.R., 31, 909-928.
37. Chung, K.J. and Liao, J.J. (2006), “The optimal ordering policy in a DCF
analysis for deteriorating items when trade credit depends on the order quantity”,
I.J.P.E., 100(1), 116-130.
38. Chung, K.J. and Lin, C.N. (2001), “Optimal inventory replenishment models
for deteriorating items taking account of time discounting”, C.O.R., 28, 67-83.
39. Clark, A.J. and Scarf, H. (1960), “Optimal policies for a multi-echelon
inventory problem”, Management Science, 6, 475-490.
40. Covert, R.P. and Philip, G.P. (1973), “An EOQ model for items with Weibull
distribution deterioration”, AIIE Trans., 5(4), 323-329.
41. Datta, T.K. and Pal, A.K. (1990), “Deterministic inventory systems for
deteriorating items with inventory level dependent demand and shortages”,
Journal of the Operational Research Society, 27, 213-224.
42. Datta, T.K. and Pal, K. (2001), “An inventory system stock-dependent, price
sensitive demand rate”, Production Planning and Control, 12, 13-20.
43. Dave, U. and Patel, L.K. (1981), “(T, Si) policy inventory model for
deteriorating items with time proportional demand”, J.O.R.S., 32, 137-142.
7
44. Dave, U. (1985), “On economic order quantity under conditions of permissible
delay in payments”, J.O.R.S., 36(11), 1069-1070.
45. Dave, U. (1986), “An order level inventory model for deteriorating items with
variable instantaneous demand and discrete opportunities for replenishment”,
Opsearch 23, 244-249.
46. Dave, U. (1989), “On a heuristic inventory-replenishment rule for items with a
linearly increasing demand incorporating shortages. Journal of the Operational
Research Society, 38(5), 459-463.
47. Deng, P.S., Lin, R.H.J. and Chu, P. (2007), “A note on the inventory models
for deteriorating items with ramp type demand”, E.J.O.R., 178, 112-120.
48. Dey, J.K., Mondal, S.K. and Maiti, M. (2008), “Two storage inventory problem
with dynamic demand and interval valued lead-time over finite time horizon
under inflation and time-value of money”, E.J.O.R., 185, 170-194.
49. Diks, E.B. and De Kok, A.G. (1998), “Optimal control of a divergent multi-
echelon inventory system”, E.J.O.R., 111, 75-97.
50. Donaldson W.A. (1977), “Inventory replenishment policy for a linear trend in
demand-an analytical solution”. Operational Research Quarterly, 28,663-670.
8
51. Dutta, T.K. and Pal, A.K. (1988), “Order level inventory system with power
demand pattern for items with variable rate of deterioration”, Indian Journal of
Pure and Applied Mathematics (I.J.P.A.M.), 19(11), 1043-1053.
52. Dutta, T.K. and Pal, A.K. (1990), “A note on an inventory model with
inventory level dependent demand rate”, J.O.R.S., 41, 971-975.
53. Dye, C.Y. (2002), “A deteriorating inventory model with stock dependent
demand and partial backlogging under conditions of permissible delay in
payments”, Opsearch, 39(3&4), 189-200.
54. Dye, C.Y. (2007), “Joint pricing and ordering policy for a deteriorating inventory
with partial backlogging”, Omega, 35(2), 184-189.
55. Dye, C.Y., Hsieh, T.P. and Ouyang, L.Y. (2007-a), “Determining optimal
selling price and lot size with a varying rate of deterioration and exponential
partial backlogging”, E.J.O.R., 181(2), 668-678.
56. Dye, C.Y., Ouyang, L.Y. and Hsieh, T.P. (2007-b), “Deterministic inventory
model for deteriorating items with capacity constraint and time-proportional
backlogging rate”, E.J.O.R., 178 (3), 789-807.
57. Ghare, P.M. and Schrader, G.P. (1963), “A model for exponentially decaying
inventory”, Journal of Industrial Engineering (J.I.E.), 14, 228-243.
9
58. Ghosh, S.K. and Chaudhuri, K.S. (2004), “An order-level inventory model for a
deteriorating item with Weibull distribution deterioration, time-quadratic demand
and shortages”, Advanced Modeling and Optimization (A.M.O.), 6(1), 21-35.
59. Ghosh, S.K. and Chaudhuri, K.S. (2005), “An EOQ model for a deteriorating
item with trended demand and variable backlogging with shortages in all cycles”,
A.M.O., 7(1), 57-68.
60. Giri, B.C. et al. (1996), “An inventory model for deteriorating items with stock
dependent demand rate”, European Journal of Operational Resaerch, 95, 604-610.
61. Giri, B.C. and Chaudhuri, K.S. (1998), “Deterministic models of perishable
inventory with stock dependent demand rate and non linear holding cost”,
E.J.O.R., 105, 467-474.
62. Giri, B.C. Chakrabarty, K.S. and Chaudhuri, K.S. (2000), “A note on a lot
sizing heuristic for deteriorating items with time-varying demands and shortages”,
C.O.R., 27, 495-505.
63. Giri, B.C., Jalan, A.K. and Chaudhuri, K.S. (2003), “Economic order quantity
model with Weibull distribution deterioration, shortage and ramp-type demand”,
I.J.S.S., 34(4), 237-243.
64. Goswami, A. and Chaudhuri, K.S. (1991), “An EOQ model for deteriorating
items with a linear trend in demand”, J.O.R.S., 42(12), 1105-1110.
10
65. Goyal, S.K. (1985), “Economic order quantity under conditions of permissible
delay in payments”, J.O.R.S., 36, 335-338.
66. Goyal, S.K. (1986), “On improving replenishment policies for linear trend in
demand”, Engineering costs and production Economics (E.C.P.E.), 10, 73-76.
67. Goyal, S.K. and Giri, B.C. (2001-a), “Recent trends in modeling of
deteriorating inventory”, E.J.O.R., 134, 1-16.
68. Goyal, S.K. and Giri, B.C. (2001-b), “A comment on change and Dye (1999):
An EOQ model for deteriorating items with time varying demand and partial
backlogging”, J.O.R.S., 52, 238 – 239.
69. Goyal, S.K. and Giri, B.C. (2003), “The production-inventory problem of a
product with time varying demand, production and deterioration rates”,
E.J.O.R., 147, 549-557.
70. Gupta, R. and Vrat, P. (1986), “Inventory model with multi-items under
constraint for stock dependent consumption rate”, Operations Research (O.R.),
24, 41-42.
71. Ha, D., Kim, S.L. (1997), “Implementation of JIT purchasing: An integrated
approach”, Production Planning and Control, 8,152-157.
72. Haley, C.W. and Higgins, R.C. (1973), “Inventory policy and trade credit
financing”, Management Science, 20(4), 464-471.
73. Hariga, M.A. (1994), “Economic analysis of dynamic inventory models with
non-stationary costs and demand”, I.J.P.E., 36, 255-266.
11
74. Hariga. M.A. (1995), “Effects of inflation and time-value of money on an
inventory model on an inventory model with time-dependent demand rate and
shortages”, E.J.O.R., 81 (3), 512-520.
75. Hariga, M.A. and Ben-Daya, M. (1996), “Optimal time-varying lot sizing
models under inflationary conditions”, E.J.O.R., 89 (2), 313-325.
76. Hill, R.M. (1995), “Inventory model for increasing demand rate followed by level
demand”, J. of Operational Research Society, 46, 1250-1259.
77. Hill, H.M., Seifbarghy, M. and Smith, D.K. (2007), “Two-echelon inventory
model with lost sales”, E.J.O.R., 181, 753-766.
78. Hollier, R.H. and Mak, K.L. (1983), “Inventory replenishment policies for
deteriorating items in a declining market”, I.J.P.E., 21, 813-826.
79. Hou, K.L. (2006), “An inventory model for deteriorating items with stock
dependent consumption rate and shortages under inflation and time discounting”,
E.J.O.R., 168, 463-474.
80. Huang, Y.F. (2007), “Optimal retailer’s replenishment decisions on the EPQ
model under two levels of trade credit policy”, E.J.O.R., 176, 1577-1591.
81. Huang, Y.F., Chung, K.J. and Goyal, S. K. (2005), “The optimal inventory
policies under permissible delay in payments depending on the ordering quantity”
International Journal of Production Economics, 95, 2, 203-213.
12
82. Hwang, H. and Shinn, S.W. (1997), “Retailer’s pricing and lot sizing policy for
exponentially deteriorating products under the condition of permissible delay in
payments”, C.O.R., 24, 539-547.
83. Jaggi, C.K., Aggarwal, K.K. and Goel, S.K. (2007), “Optimal order policy for
deteriorating items with inflation induced demand”, I.J.P.E., 103 (2), 707-714.
.
84. Jamal, A.M.M., Sarker, B.R. and Wang, S. (1997), “An ordering policy for
deteriorating items with allowable shortage and permissible delay in payment”,
J.O.R.S., 48, 826-833.
85. Jamal, A.M.M, Sarker, B.R. and Wang, S. (2000), “Optimal payment time for a
retailer under permitted delay of payment by the wholesaler”, I.J.P.E., 66, 59-66.
86. Jolai, F., Tavakkoli-Moghaddam, R., Rabbani, M. and Sadoughian, M.R.
(2006), “An economic production lot size model with deteriorating items, stock-
dependent demand, inflation, and partial backlogging”, Applied Mathematics and
Computation (A.M.C.), 181, 380-389.
87. Kingsman, B.G. (1983), “The effect of payment rules on ordering and stock
holding in purchasing”, J.O.R.S., 34, 1085-1098.
88. Kishan, H. and Mishra, P.N. (1995), “An inventory model with exponential
demand and constant deterioration with shortages”, Indian Journal of
Mathematics, 37(3), 275-279.
13
89. Khanra, S. and Chaudhuri, K.S. (2003), “A note on an order-level inventory
model for a deteriorating item with time-dependent quadratic demand”, C.O.R.,
30, 1901-1916.
90. Lee, H.T. and Wu, J.C. (2006), “A study on inventory replenishment policies in
a two-echelon supply chain system”, Computers & Industrial Engineering, 51,
2, 257-263.
91. Levin, R.I., McLaughlin, C.P., Lamone, R.P. and Kottas, J.F. (1972),
“Productions Operations Management: Contemporary Policy for Managing
Operating Systems”, McGraw-Hill, New York p. 373.
92. Lev,S.K.B. et al.(1994), “On the EOQ model with inventory level dependent
demand rate and random yield”, Operation Research Letter 16,167-176.
93. Liao, H.C., Tsai, C.H. and Su, C.T. (2000), “An inventory model with
deteriorating items under inflation when a delay in payment is permissible”,
I.J.P.E., 63, 207-214.
94. Liao, J.J. (2007), “On an EPQ model for deteriorating items under permissible
delay in payments”, Applied Mathematical Modeling, 31, 3, 393-403.
95. Mahapatra, N.K. and Maiti, M. (2005), “Multi objective inventory models of
multi items with quality and stock dependent demand and stochastic
deterioration”, Advanced Modeling and optimization, 7, 1, 69-84.
14
96. Maity,K. and Maiti,M. (2007), “Possibility and necessity constraints and their
defuzzification. A multi item production inventory scenario via optimal control
theory”, European Journal of Operational Research, 177, 882-896.
97. Mak, K. L. (1987), “Determining optimal production-inventory control policies
for an inventory system with partial backlogging”, C.O.R., 14(4), 299-304.
98. Mandal,M.and Maiti,M.(1997), “Inventory model for damageable item with
stock dependent demand and shortages”, Opsearch,34,155-166.
99. Mandal, B. and Pal, A.K. (1998), “Order level inventory system with ramp type
demand rate for deteriorating items”, Journal of interdisciplinary Mathematics, 1,
49-66.
100. Mandal, B.N. and Phaujdar, S. (1989), “An inventory model for deteriorating
items and stock dependent consumption rate”, J.O.R.S., 40, 483-488.
101. Mandal, M. and Maiti, M. (1997), “Inventory model for damageable items
with stock dependent demand and shortages”, Opsearch, 34(3), 155-166.
102. Mandal, M. and Maiti, M. (1999), “Inventory of damageable items with
variable replenishment rate, stock-dependent demand and some units in hand”,
Applied Mathematical Modeling 23 (1999), pp. 799–807.
103. Mandal, N.K., Roy, T.K. and Maiti, M. (2006), “Inventory model of
deteriorated items with a constraint: A geometric programming approach”,
E.J.O.R., 173, 199-210.
15
104. Manna, S.K. and Chaudhuri, K.S. (2006), “An EOQ model with ramp type
demand rate, time dependent deterioration rate, unit production cost and
shortages”, E.J.O.R., 171, 557-566.
105. Misra, R.B. (1975-a), “A study of inflationary effects on inventory
systems”, Logistic Spectrum, 9(3), 260-268.
106. Misra, R.B. (1975-b), “Optimum production lot size model for a system with
deteriorating inventory”, I.J.P.E., 13, 495-505.
107. Misra, R.B. (1979), “A note on optimal inventory management under
inflation”, N.R.L., 26, 161-165.
108. Montogomery, D.C., Bazaraa, M.S., and Keshwani, A.K. (1973),
“Inventory models with a mixture of backorders and lost sales”, Naval Research
Logistics (N.R.L.), 20/2, 255-263.
109. Moon, I. And Lee, S. (2000), “The effects of inflation and time-value of
money on an economic order quantity model with a random product life cycle,
E.J.O.R., 125, 588-601.
110. Moon, I., Giri, B.C. and Ko, B. (2005), “Economic order quantity models for
ameliorating / deteriorating items under inflation and time discounting”, E.J.O.R.,
162 (3), 773-785.
16
111. Ouyang, L.Y., et al. (2008), “Retailer’s ordering policy for non-instantaneous
deteriorating items with quantity discount, stock dependent demand and stochastic
backorder rate”, J. of Chinese Institute of Industrial Engineers, 25,1,62-72.
112. Padmanabhan, G. and Vrat, P. (1995), “EOQ models for perishable items
under stock dependent selling rate”, E.J.O.R., 86, 281-292.
113. Pal, S., Goswami, A. and Chaudhuri, K.S. (1993), “A deterministic
inventory model for deteriorating items with stock dependent demand rate.
I.J.P.E., 32, 291-299.
114. Panda, S., Saha, S. and Basu, M. (2007), “An EOQ model with generalized
ramp-type demand and Weibull distribution deterioration”, Asia Pacific Journal of
Operational Research, 24(1), 1-17.
115. Panda, D. et al. (2008), “A single period inventory model with
imperfect production and stochastic demand under chance and imprecise
constraints”, European Journal of Operational Research, 188, 121-139.
116. Papachristos, S. and Skouri, K. (2000), “An optimal replenishment policy
for deteriorating items with time-varying demand and partial-exponential-type
backlogging”, O.R.L., 27, 175-184.
117. Park, K.S. (1982), “Inventory models with partial backorders”, I.J.S.S., 13,
1313-1317.
118. Philip, G.C. (1974), “A generalize EOQ model for items with Weibull
distribution deterioration”, AIIE Trans., 6, 159-162.
17
119. Pierskalla, W.P. and Roach, C.D. (1972), “Optimal issuing policies for
perishable inventory”, Management Science, 18, 603-614.
120. Raafat, F. (1991), “Survey of literature on continuously deteriorating
inventory models”, J.O.R.S., 42, 27-37.
121. Rao, K. S. and Rajani Paul, D. R. (2005), “An order level inventory
model for deteriorating items with inventory returns and special sales”, Indian
Journal of Mathematics and Mathematical Sciences,1,35-43.
122. Rau, H., Wu, M.Y. and Wee, H.M. (2003), “Integrated inventory model for
deteriorating items under a multi-echelon supply chain environment”, I.J.P.E.,
86(2), 155-168.
123. Ray, J. and Chaudhuri, K.S. (1997), “An EOQ model with stock-dependent
demand, shortage, inflation and time discounting”, I.J.P.E., 53 (2), 171-180.
124. Ritchie E. (1980), “Practical inventory replenishment policies for a linear trend
in demand followed by a period of steady demand”, Journal of Operational
Research Society, 31,605-613.
125. Rosenberg, D. (1979), “A new analysis of a lot size model with partial
backlogging”, N.R.L., 265, 349-353.
126. Roy. A. (2008), “An inventory model for deteriorating items with price
dependent demand and time varying holding cost”, Advanced Modeling and
Optimization”, 10,26-37.
18
127. Roy Chowdhury, M. and Chaudhuri, K.S. (1983), “An order level inventory
model for deteriorating items with finite rate of replenishment”, Opsearch, 20, 99-
106.
128. Roy, T. and Chaudhuri, K.S. (2006), “Deterministic inventory model
for deteriorating items with stock-level dependent demand and shortage”,
Nonlinear Phenomena in Complex Systems, 9, 1, 43-52.
129. Sachan, R.S. (1984), “On (T, Si) policy inventory model for deteriorating
items with time proportional demand”, J.O.R.S., 35(11), 1013-1019.
130. Sana, S., Goyal, S.K. and Chaudhuri, K.S. (2004), “A production-inventory
model for a deteriorating item with trended demand and shortages”, E.J.O.R., 157,
357-371.
131. Sana, S., and Chaudhuri, K.S. (2008), “A deterministic EOQ model with
delays in payments and price-discounts offer”, E.J.O.R., 184, 509-533.
132. Sharma, A.K. and Singh, S.R. (2003), “An order level inventory model for
deteriorating items with an exponentially increasing demand with time”, Acta
Ciencia Indica, XXIX, 213-217.
133. Shah, N.H. (1993), “Probabilistic time-scheduling model for
exponentially decaying inventory when delay in payments are permissible”,
International Journal of Production Economics, 32, 77-82.
134. Shah, Y.K. and Jaiswal, M.C. (1977), “An order level inventory model for a
system with constant rate of deterioration”, Opsearch, 14(3), 174-184.
19
135. Sherbrooke, C.C. (1968), “Metric: A multi-echelon technique for recoverable
item control”, O.R., 16, 122-141.
136. Silver E.A., Meal H.C. (1969), “A Simple modification of the EOQ for
the case of a varying demand rate”, Production and Inventory Management, 10(4),
52-65.
137. Silver E.A. (1979), “A simple inventory replenishment decision rule for a
linear trend in demand”, Journal of Operational Research Society, 30,71-75.
138. Silver,E.A and Peterson.R. (1985), “Decision systems for inventory
management and productions planning”, Seconded. John Wiley, New York.
139. Singh, S.R. and Singh, C. (2008), “Optimal ordering policy for decaying
items with stock-dependent demand under inflation in a supply chain”,
International Review of Pure and Applied Mathematics, 1, 31-39.
140. Skouri, K., Papachristos, S. (2003-a), “Four inventory models for
deteriorating items with time varying demand and partial backlogging: A cost
comparison”, Optimal Control Applications and Methods, 24(6), 315 – 330.
141. Skouri, K. and Papachristos, S. (2003-b), “Optimal stopping and restarting
production times for an EOQ model with deteriorating items and time dependent
partial backlogging”, I.J.P.E., 81-82, 525-531.
20
142. Soni, H. and Shah, N.H. (2008), “Optimal ordering policy for stock-dependent
demand under progressive payment scheme”, E.J.O.R., 184 (1), 91-100.
143. Song, X. and Cai, X. (2006), “On optimal payment time for a retailer under
permitted delay of payment by the wholesaler”, International Journal of
Production Economics, 103, 1, 246-251.
144. Su, C.T., Lin, C.W. and Tsai, C.H. (1999), “A deterministic production
inventory model for deteriorating items and exponential declining demand”,
Opsearch, 36, 95-106.
145. Teng, J.T., Chang, H.J., Dye, C.Y. and Hung, C.H. (2002), “An optimal
replenishment policy for deteriorating items with time-varying demand and partial
backlogging”, O.R.L., 30, 387-393.
146. Teng, J.T., Chang, C.T. and Goyal, S.K. (2005), “Optimal pricing and
ordering policy under permissible delay in payments”, I.J.P.E., 97, 121-129.
147. Teng, J.T., Ouyang, L.Y. and Chen, L.H. (2007), “A comparison between
two pricing and lot-sizing models with partial backlogging and deteriorated
items”, I.J.P.E., 105(1), 190-203.
148. Thangam, A. and Uthayakumar, R. (2008), “A two-level supply chain with
partial backordering and approximated Poisson demand”, E.J.O.R., 187 (1), 228-
242.
149. Van der Heijden, M.C., Diks, E.B. and De Kok, A.G. (1997), “Stock
allocation in general multi-echelon distribution systems with (R,S) order-up-to-
policies”, I.J.P.E., 49, 157-174.
21
150. Wang, et al. (2000), “Supply chain models for perishable products
under inflation and permissible delay in payments”, Computers and Operations
Research, 27,1,59-75.
151. Wee, H.M. (1993), “Economic production lot size model for deteriorating
items with partial back ordering”, C.I.E., 24(3), 449-458.
152. Wee, H.M. (1995-a), “Joint pricing and replenishment policy for
deteriorating inventory with declining market”, I.J.P.E., 40(2-3),
163-171.
153. Wee, H.M. (1995-b), “A deterministic lot size inventory model for
deteriorating items with shortages and a declining market. C.O.R., 22, 345-356.
154. Wee, H.M. (1999), “Deteriorating inventory model with quantity discount,
pricing and partial backordering”, I.J.P.E., 59, 511-518.
155. Wu, J.W., Lin, C., Tan, B. and Lee, W.C. (1999), “An EOQ inventory model
with ramp-type demand rate for items with Weibull deterioration”, Information
and Management Science, 3, 41-51.
156. Wu, K.S. (2001), “An EOQ inventory model for items with Weibull
distribution deterioration, ramp type demand rate and partial backlogging”,
P.P.C., 12(8), 787 – 793.
22
157. Wu, K.S., Ouyang, L.Y. and Yang, C.T. (2006), “An optimal replenishment
policy for non-instantaneous deteriorating items with stock dependent demand
and partial backlogging”, I.J.P.E., 101, 369-384.
158. Wu, M.Y. and Wee, H.M. (2005), “An integrated production inventory model
with shortage for deteriorating items in a supply chain”, Journal of Information
and Optimization Sciences. 26(1), 233-246.
159. Yang, H.L. (2004), “Two-warehouse inventory models for deteriorating items
with shortages under inflation”, E.J.O.R., 157, 344-356.
160. Yang, H.L. (2006), “Two-warehouse partial backlogging inventory models for
deteriorating items under inflation”, I.J.P.E., 103(1), 362-370.
161. Yang, P.C. and Wee, H.M. (2000), “Economic order policy of deteriorated
items for vendor and buyer: An integral approach”, Production Planning and
control, 11(5), 474-480.
162. Yang, P.C. and Wee, H.M. (2002), “A single-vendor and multiple-buyers
production inventory policy for deteriorating item”, E.J.O.R., 143, 570-581.
163. Yang, P.C. and Wee, H.M. (2003), “An integrating multi lot size production
inventory model for deteriorating item”, Computers & Operations Research, 30,
671- 682.
164. Yu, J.C.P., Wee, H.M. and Chen, J.M. (2005), “Optimal ordering policy for
a deteriorating item with imperfect quality and partial backordering”, J.C.I.I.E.,
22(6), 509-520.
23
165. Zangwill, W.I. (1966), “A deterministic multi-period production scheduling
model with backlogging”, Management Science, 13, 105-119.
166. Zhou, Y.W., Lau, H.S. and Yang, S.L. (2004), “A finite horizon lot-sizing
problem with time-varying deterministic demand and waiting-time-dependent
partial backlogging”, I.J.P.E., 91(2), 109-119.
167. Zhou, Y.W. and Yang, S.L. (2005), “A two-warehouse inventory model for
items with stock-level-dependent demand rate. I.J.P.E., 95 (2), 215-228.
