Free Access
Issue
RAIRO-Oper. Res.
Volume 55, 2021
Regular articles published in advance of the transition of the journal to Subscribe to Open (S2O). Free supplement sponsored by the Fonds National pour la Science Ouverte
Page(s) S195 - S224
DOI https://doi.org/10.1051/ro/2019079
Published online 09 February 2021
  • P. Aggrawal and T.J. Singh, An EOQ model with ramp type demand rate, time dependent deterioration rate and shortages. Glob. J. Pure Appl. Math. 13 (2017) 3381–3393. [Google Scholar]
  • L.E.C. Barron, A.A. Shaikh. S. Tiwari and G.T. Garza, An EOQ inventory model with nonlinear stock dependent holding cost, nonlinear stock dependent demand and trade-credit. Comput. Ind. Eng. 139 (2020) 105557. [Google Scholar]
  • A.K. Bhunia, C.K. Jaggi, A. Sharma and R. Sharma, A two-warehouse inventory model for deteriorating items under permissible delay in payment with partial backlogging. Appl. Math. Comput. 232 (2014) 1125–1137. [Google Scholar]
  • D. Chakraborty, D.K. Jana and T.K. Roy, Two-warehouse partial backlogging inventory model with ramp type demand rate, three-parameter Weibull distribution deterioration under inflation and permissible delay in payments. Comput. Ind. Eng. 123 (2018) 157–179. [Google Scholar]
  • H.J. Chang and C.Y. Dye, An inventory model for deteriorating items with partial backlogging and permissible delay in payments. Int. J. Syst. Sci. 32 (2001) 345–352. [Google Scholar]
  • J. Chen, M. Dong, Y. Rong and L. Yang, Dynamic pricing for deteriorating products with menu cost. Omega 75 (2018) 13–26. [Google Scholar]
  • L. Chen, X. Chen, M.F. Keblis and G. Li, Optimal pricing and replenishment policy for deteriorating inventory under stock-level-dependent, time-varying and price-dependent demand. Comput. Ind. Eng. 135 (2018) 1294–1299. [Google Scholar]
  • P. Chu, K.J. Chung and S.P. Lan, Economic order quantity of deteriorating items under permissible delay in payments. Comput. Oper. Res. 25 (1998) 817–824. [Google Scholar]
  • K.J. Chung, S.L. Chang and W.D. Yang, The optimal cycle time for exponentially deteriorating products under trade-credit financing. Eng. Econ. 46 (2001) 232–242. [Google Scholar]
  • R.P. Covert and G.C. Philip, An EOQ model for items with Weibull distribution deterioration. AIIE Trans. 5 (1973) 323–326. [Google Scholar]
  • B.C. Das, B. Das and S.K. Mondal, An integrated production-inventory model with defective item dependent stochastic credit period. Comput. Ind. Eng. 110 (2017) 255–263. [Google Scholar]
  • B.K. Dey, B. Sarkar, M. Sarkar and S. Pareek, An integrated inventory model involving discrete setup cost reduction, variable safety factor, selling price dependent demand, and investment. RAIRO: OR 53 (2019) 39–57. [Google Scholar]
  • A. Diabat, A.A. Taleizadeh, M. Lashgari, A lot sizing model with partial downstream delayed payment, partial upstream advance payment, and partial backordering for deteriorating items. J. Manuf. Syst. 45 (2017) 322–342. [Google Scholar]
  • W.A. Donaldson, Inventory replenishment policy for a linear trend in demand. Oper. Res. Q. 28 (1977) 663–670. [Google Scholar]
  • C.Y. Dye and C.T Yang, Optimal dynamic pricing and preservation technology investment for deteriorating products with reference price effects. Omega 62 (2016) 52–67. [Google Scholar]
  • M. Ghandehari and M. Dezhtaherian, An EOQ model for deteriorating items with partial backlogging and financial considerations. Int. J. Serv. Oper. Manage. 32 (2019) 269–284. [Google Scholar]
  • P.M. Ghare and G.F. Schrader, A model for an exponentially decaying inventory. J. Ind. Eng. 14 (1963) 238–243. [Google Scholar]
  • B.C. Giri, A.K. Jalan and K.S. Chaudhuri, Economic order quantity model with Weibull deterioration distribution, shortage and ramp-type demand. Int. J. Syst. Sci. 34 (2003) 237–243. [Google Scholar]
  • S.K. Goyal, Economic order quantity under conditions of permissible delay in payments. J. Oper. Res. Soc. 36 (1985) 335–338. [Google Scholar]
  • F.M. Harris, How many parts to make at once. Fact. Mag. Manage. 10 (1913) 135–136. [Google Scholar]
  • K.C. Hung, An inventory model with generalized type demand, deterioration and backorder rates. Eur. J. Oper. Res. 208 (2011) 239–242. [Google Scholar]
  • C.K. Jaggi, L.E.C. Barron, S. Tiwari and A.A. Shafi, Two-warehouse inventory model for deteriorating items with imperfect quality under the conditions of permissible delay in payments. Sci. Iran. Trans. E Ind. Eng. 24 (2017) 390–412. [Google Scholar]
  • C.K. Jaggi, V.S.S. Yadavalli, M. Verma and A. Sharma, An EOQ model with allowable shortage under trade-credit in different scenario. Appl. Math. Comput. 252 (2015) 541–551. [Google Scholar]
  • A.M.M. Jamal, B.R. Sarker and S. Wang, An ordering policy for deteriorating items with allowable shortage and permissible delay in payment. J. Oper. Res. Soc. 48 (1997) 826–833. [Google Scholar]
  • R. KavithaPriya and K. Senbagam, An EOQ inventory model for two parameter weibull deterioration with quadratic time dependent demand and shortages. Int. J. Pure Appl. Math. 119 (2018) 467–478. [Google Scholar]
  • S. Khanra, S.K. Ghosh and K.S. Chaudhuri, An EOQ model for a deteriorating item with time dependent quadratic demand under permissible delay in payment. Appl. Math. Comput. 218 (2011) 1–9. [Google Scholar]
  • M.S. Kim and B. Sarkar, Multi-stage cleaner production process with quality improvement and lead time dependent ordering cost. J. Clean Prod. 144 (2016) 572–590. [Google Scholar]
  • M. Lashgari, A.A. Taleizadeh and S.S. Sana, An inventory control problem for deteriorating items with backordering and financial considerations under two levels of trade-credit linked to order quantity. J. Ind. Manage. Optim. 12 (2016) 1091–1119. [Google Scholar]
  • J. Li, H. Feng and Y. Zeng, Inventory games with permissible delay in payments. Eur. J. Oper. Res. 234 (2014) 694–700. [Google Scholar]
  • J. Lin, A demand independent inventory model. Yugosl. J. Oper. Res. 23 (2013) 129–135. [Google Scholar]
  • A. Mahmoodi, Joint pricing and inventory control of duopoly retailers with deteriorating items and linear demand. Comput. Ind. Eng. 132 (2019) 36–46. [Google Scholar]
  • B. Mandal and A.K. Pal, Order level inventory system with ramp type demand rate for deteriorating items. J. Interdiscip. Math. 1 (1998) 49–66. [Google Scholar]
  • A.H. Mashud, M.A. Khan, M.S. Uddin and M.N. Islam, A non-instantaneous inventory model having different deterioration rates with stock and price dependent demand under partially backlogged shortages. Uncertain Supply Chain Manage. 6 (2018) 49–64. [Google Scholar]
  • J. Min, Y. Zhou, G.Q. Liu and S.D. Wang, An EPQ model for deteriorating items with inventory level-dependent demand and permissible delay in payments. Int. J. Syst. Sci. 43 (2012) 1039–1053. [Google Scholar]
  • U. Mishra, An EOQ model with time dependent Weibull deterioration, quadratic demand and partial backlogging. Int. J. Appl. Comput. Math. 2 (2016) 545–563. [Google Scholar]
  • I. Moon, E. Shin and B. Sarkar, Min-max distribution free continuous-review model with a service level constraint and variable lead time. Appl. Math. Comput. 229 (2014) 310–315. [MathSciNet] [Google Scholar]
  • A. Mukhopadhyay and A. Goswami, An EOQ model with shortages and selling price dependent time varying demand. Int. J. Supply Chain Inventory Manage. 1 (2016) 133–153. [Google Scholar]
  • B. Pal, Optimal production model with quality sensitive market demand, partial backlogging and permissible delay in payment. RAIRO: OR 52 (2018) 499–512. [Google Scholar]
  • V. Pando, L.A. San-Jose and J. Sicilia, Profitability ratio maximization in an inventory model with stock-dependent demand rate and non-linear holding cost. Appl. Math. Model. 66 (2018) 643–661 [Google Scholar]
  • V. Pando, L.A. San-Jose, J.G. Laguna and J. Sicilia, Optimal lot-size policy for deteriorating items with stock-dependent demand considering profit maximization. Comput. Ind. Eng. 117 (2018) 81–93. [Google Scholar]
  • S. Papachristos and K. Skouri, An optimal replenishment policy for deteriorating items with time-varying demand and partial exponential type backlogging. Oper. Res. Lett. 27(4) (2000) 175–184. [Google Scholar]
  • M. Pervin, S.K. Roy and G.W. Weber, Analysis of inventory control model with shortage under time dependent demand and time-varying holding cost including stochastic deterioration. Ann. Oper. Res. 260 (2018) 437–460. [Google Scholar]
  • Y. Qiu, J. Qiao and P.M. Pardalos, Optimal production, replenishment, delivery, routing and inventory management policies for products with perishable inventory. Omega 82 (2019) 193–204. [Google Scholar]
  • R.S. Rajan and R. Uthayakumar, Analysis and optimization of an EOQ inventory model with promotional efforts and backordering under delay in payments. J. Manage. Anal. 4 (2017) 159–181. [Google Scholar]
  • L.A. San-Jose, J. Sicilia and D.A.L. Pablo, An inventory system with demand dependent on both time and price assuming backlogged shortages. Eur. J. Oper. Res. 270 (2018) 889–897. [Google Scholar]
  • L.A. San-Jose, J. Sicilia, L.E.C. Barronz and J.M. Gutierrezx, Optimal price and quantity under power demand pattern and non-linear holding cost. Comput. Ind. Eng. 129 (2019) 426–434. [Google Scholar]
  • B. Sarkar, An EOQ model with delay in payments and time varying deterioration rate. Math. Comput. Model. 55 (2012) 367–377. [Google Scholar]
  • B. Sarkar, Supply chain coordination with variable backorder, inspections, and discount policy for fixed lifetime products. Math. Prob. Eng. 2016 (2016) 14. [Google Scholar]
  • B. Sarkar, Mathematical and analytical approach for the management of defective items in a multi-stage production system. J. Clean Prod. 218 (2019) 896–919. [Google Scholar]
  • B. Sarkar and S. Sarkar, An improved inventory model with partial backlogging, time varying deterioration and stock-dependent demand. Econ. Model. 30 (2013) 924–932. [Google Scholar]
  • B. Sarkar, L.E.C. Barron, M. Sarkar and M.L. Singgih, An economic production quantity model with random defective rate, rework process and backorders for a single stage production system. J. Manuf. Syst. 33 (2014) 423–435. [Google Scholar]
  • B. Sarkar, H. Gupta, K. Chaudhuri and S.K. Goyal, An integrated inventory model with variable lead time, defective units and delay in payments. Appl. Math. Comput. 237 (2014) 650–658. [Google Scholar]
  • B. Sarkar, S. Saren and H. M. Wee, An inventory model with variable demand, component cost and selling price for deteriorating items. Econ. Model. 30 (2013) 306–310. [Google Scholar]
  • B. Sarkar, S. Saren, D. Sinha and S. Hur, Effect of unequal lot sizes, variable setup cost, and carbon emission cost in a supply chain model. 2015 (2015) 469–486. [Google Scholar]
  • D. Seifert, R.W. Seifert and O.H.D. Isaksson, A test of inventory models with permissible delay in payment. Int. J. Prod. Res. 55 (2017) 1117–1128. [Google Scholar]
  • N. Sen and S. Saha, An inventory model for deteriorating items with time dependent holding cost and shortages under permissible delay in payment. Int. J. Procure. Manage. 11 (2018) 518–531. [Google Scholar]
  • A.A. Shaikh, G.C. Panda, S. Sahu and A.K. Das, Economic order quantity model for deteriorating item with preservation technology in time dependent demand with partial backlogging and trade-credit. Int. J. Logist. Syst. Manage. 32 (2019) 528–542. [Google Scholar]
  • Y. Shi, Z. Zhang, F. Zhou and Y. Shi, Optimal ordering policies for a single deteriorating item with ramp-type demand rate under permissible delay in payments. J. Oper. Res. Soc. 70 (2019) 1848–1868. [Google Scholar]
  • S.W. Shinn, H. Hwang and S.S. Park, Joint price and lot size determination under conditions of permissible delay in payments and quantity discounts for freight cost. Eur. J. Oper. Res. 91 (1996) 528–542. [Google Scholar]
  • E.A. Silver and H.C. Meal, A heuristic for selecting lot size requirements for the case of a deterministic time varying demand rate and discrete opportunities for replenishment. Prod. Inventory Manage. 14 (1973) 64–74. [Google Scholar]
  • T. Singh and H. Pattanayak, An EOQ model for a deteriorating item with time dependent quadratic demand and variable deterioration under permissible delay in payment. Appl. Math. Sci. 59 (2013) 2939–2951. [Google Scholar]
  • T. Singh, P.J. Mishra and H. Pattanayak, An EOQ inventory model for deteriorating items with time-dependent deterioration rate, ramp-type demand rate and shortages. Glob. J. Pure Appl. Math. 12 (2018) 423–437. [Google Scholar]
  • K. Skouri, An EOQ model with backlog-dependent demand. Oper. Res. Int. J. 18 (2018) 561–574. [Google Scholar]
  • K. Skouri, I. Konstantaras, S. Papachristos and I. Ganas, Inventory models with ramp type demand rate, partial backlogging and Weibull deterioration rate. Eur. J. Oper. Res. 192 (2009) 79–92. [Google Scholar]
  • A.A. Taleizadeh and M. Nematollahi, An inventory control problem for deteriorating items with backordering and financial considerations. Appl. Math. Model. 38 (2014) 93–109. [Google Scholar]
  • A.A. Taleizadeh, D. Pentico, M.S. Jabalame and M. Aryanezhad, An EOQ model with partial delayed payment and partial backordering. Omega 41 (2013) 354–368. [Google Scholar]
  • M. Tayyab and B. Sarkar, Optimal batch quantity in a cleaner multi-stage lean production system with random defective rate. J. Clean Prod. 139 (2016) 922–934. [Google Scholar]
  • Vandana and B.K. Sharma, An EOQ model for retailers partial permissible delay in payment linked to order quantity with shortages. Math. Comput. Simul. 125 (2016) 99–112. [Google Scholar]
  • R.H. Wilson, A scientific routine for stock control. Harv. Bus. Rev. 13 (1934) 116–128. [Google Scholar]
  • K.S. Wu, An EOQ inventory model for items with weibull distribution deterioration, ramp type demand rate and partial backlogging. Prod. Plan. Control Manage. Oper. 12 (2001) 787–793. [Google Scholar]
  • K.S. Wu, L.Y. Ouyang and C.T. Yang, An optimal replenishment policy for non-instantaneous deteriorating items with stock-dependent demand and partial backlogging. Int. J. Prod. Econ. 101 (2006) 369–384. [Google Scholar]
  • J. Wu, K. Skouri, J.T. Teng and Y. Hu, Two inventory systems with trapezoidal-type demand rate and time-dependent deterioration and backlogging. Expert Syst. Appl. 46 (2016) 367–379. [Google Scholar]
  • J.W. Wu, L. Chinho, B. Tan and W.C. Lee, An EOQ inventory model with ramp type demand rate for items with Weibull deterioration. Int. J. Inf. Manage. Sci. 10 (1999) 41–51. [Google Scholar]

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