Research Article
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Year 2020, , 1168 - 1189, 02.06.2020
https://doi.org/10.15672/hujms.476056

Abstract

References

  • [1] L.E. Cárdenas-Barrón, Economic production quantity with rework process at a singlestage manufacturing system with planned backorders, Comp. Ind. Eng. 57 (3), 1105– 1113, 2009.
  • [2] H.C. Chang, C.H. Ho, L.Y. Ouyang and C.H. Su, The optimal pricing and ordering policy for an integrated inventory model when trade-credit linked to order quantity, Appl. Math. Model. 33, 2978–2991, 2009.
  • [3] Y.C. Chen, An optimal production and inspection strategy with preventive maintenance error and rework, J. Manu. Sys. 32 (1), 99–106, 2013.
  • [4] C.Y. Dye and T.P. Hsieh, An optimal replenishment policy for deteriorating items with effective investment in preservation technology, Euro. J. Oper. Res. 218 (1), 106–112, 2012.
  • [5] G. Fauza, Y. Amer, S.H. Lee and H. Prasetyo, An integrated single-vendor multibuyer production-inventory policy for food products incorporating quality degradation, Int. J. Prod. Eco. 182, 409–417, 2016.
  • [6] S.K. Goyal, A joint economic lot size model for purchaser and vendor: A comment, Dec. Sci. 19, 236–241, 1988.
  • [7] M.H. Hassan and S.L. Diab, Visual inspection of products with geometrical equality characteristics of known tolarences, Ain. Shams. Eng. J. 1 (1), 79–84, 2010.
  • [8] T.P. Hsieh and C.Y. Dye, A production-inventory model incorporating the effect of preservation technology investment when demand is fluctuating with time, J. Comp. Appl. Math. 239, 25–36, 2013.
  • [9] J.T. Hsu and L.F. Hsu, An EOQ model with imperfect quality items, inspection errors, shortage backordering, and sales returns, Int. J. Prod. Eco. 143 (1), 162–170, 2013.
  • [10] P. Hsu, H.M. Wee and H. Teng, Preservation technology investment for deteriorating inventory, Int. J. Prod. Eco. 124 (2), 388–394, 2010.
  • [11] J.K. Jha and K. Shanker, An integrated-inventory problem with transportation in a divergent supply chain under service-level constraint, J. Manu. Sys. 33, 462–475, 2014.
  • [12] U. Mishra, L.E. Cárdenas-Barrón, S. Tiwari, A.A. Shaikh and G. Treviño-Garza, An inventory model under price and stock dependent demand for controllable deterioration rate with shortages and preservation technology investment, Annal. Oper. Res. 9, 351–365, 2015.
  • [13] L.Y. Ouyang, L.Y. Chen and C.T. Yang, Impacts of collaborative investment and inspection policies on the integrated inventory model with defective items, Int. J. Prod. Res. 51 (19), 5789–5802, 2013.
  • [14] L.Y. Ouyang, C.H. Ho, C.H. Su and C.T. Yang, An integrated inventory model with capacity constraint and ordersize dependent trade-credit, Comp. Ind. Eng. 84, 133– 143, 2015.
  • [15] L.Y. Ouyang, K.S. Wu and C.T. Yang, A study on an inventory model for noninstantaneous deteriorating items with permissible delay in payments, Comp. Ind. Eng. 51 (4), 637–651, 2006.
  • [16] O. Palanci, S.Z.A. Gok, S. Ergun and G.W. Weber, Cooperative grey games and the grey Shapley value, Optimization. 64 (8), 1–12, 2014.
  • [17] M. Pervin, G.C. Mahata and S.K. Roy, An inventory model with demand declining market for deteriorating items under trade credit policy, Int. J. Manag. Sci. Eng. Manag. 11 (4), 243–251, 2016.
  • [18] M. Pervin, S.K. Roy and G.W. Weber, A T wo-echelon inventory model with stockdependent demand and variable holding cost for deteriorating items, Num. Alg. Cont. Opt. 7 (1), 21–50, 2017.
  • [19] 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, Annal. Oper. Res. 260, 437–460, 2018.
  • [20] M. Pervin, S.K. Roy and G.W. Weber, An integrated inventory model with variable holding cost under two levels of trade-credit policy, Num. Alg. Cont. Opt. 8 (2), 169– 191, 2018.
  • [21] M. Pervin, S.K. Roy and G.W.Weber, Multi-item deteriorating two-echelon inventory model with price- and stock-dependent demand: A trade-credit policy., J. Ind. Manag. Opt., 2018, DOI:10.3934/jimo.2018098.
  • [22] S. Priyan and R. Uthayakumar, An integrated production-distribution inventory system involving probabilistic defective and errors in quality inspection under variable setup cost, Int. Tran. Oper. Res. 24, 1487–1524, 2017.
  • [23] M.J. Rosenblatt and H.L. Lee, Economic production cycles with imperfect production processes, IIE Tran. 18 (1), 48–55, 1986.
  • [24] S.K. Roy, M. Pervin and G.W. Weber, A two-warehouse probabilistic model with price discount on backorders under two levels of trade-credit policy, J. Ind. Manag. Opt. 2018, doi:10.3934/jimo.2018167.
  • [25] Y.C. Tsao, Two-phase pricing and inventory management for deteriorating and fashion goods under trade credit, Math. Meth. Oper. Res. 72 (1), 107–127, 2010.
  • [26] H.L. Yang, J.T. Teng and M.S. Chern, An inventory model under inflation for deteriorating items with stock-dependent consumption rate and partial backlogging shortages, Int. J. Prod. Eco. 123 (1), 8–19, 2010.
  • [27] H. Yong and H. Huang, Optimizing inventory and pricing policy for seasonal deteriorating products with preservation technology investment, J. Ind. Eng. 2013, Article ID: 793568, 1–7, 2013.
  • [28] S.H. Yoo, D. Kim and M.S. Park, Inventory models for imperfect production and inspection processes with various inspection options under one-time and continuous improvement investment, Comp. Oper. Res. 39, 2001–2015, 2012.

An integrated vendor-buyer model with quadratic demand under inspection policy and preservation technology

Year 2020, , 1168 - 1189, 02.06.2020
https://doi.org/10.15672/hujms.476056

Abstract

An integrated vendor-buyer model for deteriorating items is formulated in this study. To control deterioration rate, the vendor adopts preservation technology. Shortages are allowed for both vendor and buyer. During shortage period, the vendor simply doubles the production rate to meet the demand of buyer. The vendor's demand during non-shortage period follows a constant rate but, the demand is a quadratic decreasing function of time in shortage period. The buyer's demand is a quadratic increasing function of time when shortage does not occur but at shortages period, the demand is constant. The buyer accepts an inspection policy for imperfect product. Total cost is calculated for both the model and integrated system. Thereafter, the model is solved by minimizing the total cost. Numerical examples are given to show the applicability of the model. A sensitivity analysis is done to display the realistic applicability of our model and method.

References

  • [1] L.E. Cárdenas-Barrón, Economic production quantity with rework process at a singlestage manufacturing system with planned backorders, Comp. Ind. Eng. 57 (3), 1105– 1113, 2009.
  • [2] H.C. Chang, C.H. Ho, L.Y. Ouyang and C.H. Su, The optimal pricing and ordering policy for an integrated inventory model when trade-credit linked to order quantity, Appl. Math. Model. 33, 2978–2991, 2009.
  • [3] Y.C. Chen, An optimal production and inspection strategy with preventive maintenance error and rework, J. Manu. Sys. 32 (1), 99–106, 2013.
  • [4] C.Y. Dye and T.P. Hsieh, An optimal replenishment policy for deteriorating items with effective investment in preservation technology, Euro. J. Oper. Res. 218 (1), 106–112, 2012.
  • [5] G. Fauza, Y. Amer, S.H. Lee and H. Prasetyo, An integrated single-vendor multibuyer production-inventory policy for food products incorporating quality degradation, Int. J. Prod. Eco. 182, 409–417, 2016.
  • [6] S.K. Goyal, A joint economic lot size model for purchaser and vendor: A comment, Dec. Sci. 19, 236–241, 1988.
  • [7] M.H. Hassan and S.L. Diab, Visual inspection of products with geometrical equality characteristics of known tolarences, Ain. Shams. Eng. J. 1 (1), 79–84, 2010.
  • [8] T.P. Hsieh and C.Y. Dye, A production-inventory model incorporating the effect of preservation technology investment when demand is fluctuating with time, J. Comp. Appl. Math. 239, 25–36, 2013.
  • [9] J.T. Hsu and L.F. Hsu, An EOQ model with imperfect quality items, inspection errors, shortage backordering, and sales returns, Int. J. Prod. Eco. 143 (1), 162–170, 2013.
  • [10] P. Hsu, H.M. Wee and H. Teng, Preservation technology investment for deteriorating inventory, Int. J. Prod. Eco. 124 (2), 388–394, 2010.
  • [11] J.K. Jha and K. Shanker, An integrated-inventory problem with transportation in a divergent supply chain under service-level constraint, J. Manu. Sys. 33, 462–475, 2014.
  • [12] U. Mishra, L.E. Cárdenas-Barrón, S. Tiwari, A.A. Shaikh and G. Treviño-Garza, An inventory model under price and stock dependent demand for controllable deterioration rate with shortages and preservation technology investment, Annal. Oper. Res. 9, 351–365, 2015.
  • [13] L.Y. Ouyang, L.Y. Chen and C.T. Yang, Impacts of collaborative investment and inspection policies on the integrated inventory model with defective items, Int. J. Prod. Res. 51 (19), 5789–5802, 2013.
  • [14] L.Y. Ouyang, C.H. Ho, C.H. Su and C.T. Yang, An integrated inventory model with capacity constraint and ordersize dependent trade-credit, Comp. Ind. Eng. 84, 133– 143, 2015.
  • [15] L.Y. Ouyang, K.S. Wu and C.T. Yang, A study on an inventory model for noninstantaneous deteriorating items with permissible delay in payments, Comp. Ind. Eng. 51 (4), 637–651, 2006.
  • [16] O. Palanci, S.Z.A. Gok, S. Ergun and G.W. Weber, Cooperative grey games and the grey Shapley value, Optimization. 64 (8), 1–12, 2014.
  • [17] M. Pervin, G.C. Mahata and S.K. Roy, An inventory model with demand declining market for deteriorating items under trade credit policy, Int. J. Manag. Sci. Eng. Manag. 11 (4), 243–251, 2016.
  • [18] M. Pervin, S.K. Roy and G.W. Weber, A T wo-echelon inventory model with stockdependent demand and variable holding cost for deteriorating items, Num. Alg. Cont. Opt. 7 (1), 21–50, 2017.
  • [19] 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, Annal. Oper. Res. 260, 437–460, 2018.
  • [20] M. Pervin, S.K. Roy and G.W. Weber, An integrated inventory model with variable holding cost under two levels of trade-credit policy, Num. Alg. Cont. Opt. 8 (2), 169– 191, 2018.
  • [21] M. Pervin, S.K. Roy and G.W.Weber, Multi-item deteriorating two-echelon inventory model with price- and stock-dependent demand: A trade-credit policy., J. Ind. Manag. Opt., 2018, DOI:10.3934/jimo.2018098.
  • [22] S. Priyan and R. Uthayakumar, An integrated production-distribution inventory system involving probabilistic defective and errors in quality inspection under variable setup cost, Int. Tran. Oper. Res. 24, 1487–1524, 2017.
  • [23] M.J. Rosenblatt and H.L. Lee, Economic production cycles with imperfect production processes, IIE Tran. 18 (1), 48–55, 1986.
  • [24] S.K. Roy, M. Pervin and G.W. Weber, A two-warehouse probabilistic model with price discount on backorders under two levels of trade-credit policy, J. Ind. Manag. Opt. 2018, doi:10.3934/jimo.2018167.
  • [25] Y.C. Tsao, Two-phase pricing and inventory management for deteriorating and fashion goods under trade credit, Math. Meth. Oper. Res. 72 (1), 107–127, 2010.
  • [26] H.L. Yang, J.T. Teng and M.S. Chern, An inventory model under inflation for deteriorating items with stock-dependent consumption rate and partial backlogging shortages, Int. J. Prod. Eco. 123 (1), 8–19, 2010.
  • [27] H. Yong and H. Huang, Optimizing inventory and pricing policy for seasonal deteriorating products with preservation technology investment, J. Ind. Eng. 2013, Article ID: 793568, 1–7, 2013.
  • [28] S.H. Yoo, D. Kim and M.S. Park, Inventory models for imperfect production and inspection processes with various inspection options under one-time and continuous improvement investment, Comp. Oper. Res. 39, 2001–2015, 2012.
There are 28 citations in total.

Details

Primary Language English
Subjects Mathematical Sciences
Journal Section Mathematics
Authors

Magfura Pervin This is me

Sankar Kumar Roy 0000-0003-4478-1534

Gerhard-wilhelm Weber 0000-0003-0849-7771

Publication Date June 2, 2020
Published in Issue Year 2020

Cite

APA Pervin, M., Roy, S. K., & Weber, G.-w. (2020). An integrated vendor-buyer model with quadratic demand under inspection policy and preservation technology. Hacettepe Journal of Mathematics and Statistics, 49(3), 1168-1189. https://doi.org/10.15672/hujms.476056
AMA Pervin M, Roy SK, Weber Gw. An integrated vendor-buyer model with quadratic demand under inspection policy and preservation technology. Hacettepe Journal of Mathematics and Statistics. June 2020;49(3):1168-1189. doi:10.15672/hujms.476056
Chicago Pervin, Magfura, Sankar Kumar Roy, and Gerhard-wilhelm Weber. “An Integrated Vendor-Buyer Model With Quadratic Demand under Inspection Policy and Preservation Technology”. Hacettepe Journal of Mathematics and Statistics 49, no. 3 (June 2020): 1168-89. https://doi.org/10.15672/hujms.476056.
EndNote Pervin M, Roy SK, Weber G-w (June 1, 2020) An integrated vendor-buyer model with quadratic demand under inspection policy and preservation technology. Hacettepe Journal of Mathematics and Statistics 49 3 1168–1189.
IEEE M. Pervin, S. K. Roy, and G.-w. Weber, “An integrated vendor-buyer model with quadratic demand under inspection policy and preservation technology”, Hacettepe Journal of Mathematics and Statistics, vol. 49, no. 3, pp. 1168–1189, 2020, doi: 10.15672/hujms.476056.
ISNAD Pervin, Magfura et al. “An Integrated Vendor-Buyer Model With Quadratic Demand under Inspection Policy and Preservation Technology”. Hacettepe Journal of Mathematics and Statistics 49/3 (June 2020), 1168-1189. https://doi.org/10.15672/hujms.476056.
JAMA Pervin M, Roy SK, Weber G-w. An integrated vendor-buyer model with quadratic demand under inspection policy and preservation technology. Hacettepe Journal of Mathematics and Statistics. 2020;49:1168–1189.
MLA Pervin, Magfura et al. “An Integrated Vendor-Buyer Model With Quadratic Demand under Inspection Policy and Preservation Technology”. Hacettepe Journal of Mathematics and Statistics, vol. 49, no. 3, 2020, pp. 1168-89, doi:10.15672/hujms.476056.
Vancouver Pervin M, Roy SK, Weber G-w. An integrated vendor-buyer model with quadratic demand under inspection policy and preservation technology. Hacettepe Journal of Mathematics and Statistics. 2020;49(3):1168-89.

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