Advances in Analysis

Note on “An Easy Method to Derive EOQ and EPQ Inventory Models with Backorders”

Download PDF (222.7 KB) PP. 10 - 13 Pub. Date: January 15, 2017

DOI: 10.22606/aan.2017.11002

Author(s)

Shu-Cheng Lin
Department of Hospital Management, Lee-Ming Institute of Technology
Han-Wen Tuan
Department of Computer Science and Information Management, Hungkuang University
Peterson Julian^*
Department of Traffic Science, Central Police University

Abstract

Cárdenas-Barrón (2010) applied algebraic methods to EOQ and EPQ models without referring to differential equations, allowing researchers without backgrounds in calculus to understand inventory models with ease. In this note, we point out that the derivation for EPQ model can be obtained by a transformation of the EOQ model and then we provide a further simplification of his approach such that future practitioners can realize his important findings and apply algebraic methods in their own research.

Keywords

Algebraic method, cauchy-Bunyakovsky-Schwarz (CBS) inequality, arithmeticgeometric mean (AGM) inequality.

References

[1] R. W. Grubbstrom and A. Erdem, “The EOQ with backlogging derived without derivatives,” International Journal of Production Economics, vol. 59, no. 1–3. pp. 529-530, 1999.

[2] L. E. Cárdenas-Barrón, “The derivation of EOQ/EPQ inventory models with two backorders costs using analytic geometry and algebra,” Applied Mathematical Modelling, vol. 35, no. 5, pp. 2394-2407, 2011.

[3] R. Ronald, G. K. Yang and P. Chu, “Technical note: The EOQ and EPQ models with shortages derived without derivatives,” International Journal of Production Economics, vol. 92, no. 2, pp. 197-200, 2004.

[4] C. H. Lan, Y. C. Yu, R. H. J. Lin, C. T. Tung, C. P. Yen and P. S. Deng, “A note on the improved algebraic method for the EPQ model with stochastic lead time,” International Journal of Information and Management Sciences, vol. 18, no. 1, pp. 91-96, 2007.

[5] S. Lin, Y. Wou and C. Chao, “Note on solving inventory models from operational research view,” Production Planning and Control, vol. 24, no. 12, pp. 1077-1080, 2013.

[6] L. E. Cárdenas-Barrón, “An easy method to derive EOQ and EPQ inventory models with backordered,” Computers and Mathematics with Applications, vol. 59, pp. 948-952, 2010.

[7] G. A. Widyadana and H. M. Wee, “Revisiting lot sizing for an inventory system with product recovery,” Computers and Mathematics with Applications, vol. 59, no. 8, pp. 2933-2939, 2010.

[8] R. Teunter, “Lot-sizing for inventory systems with product recovery,” Computers & Industrial Engineering, vol. 46, pp. 431-441, 2004.

[9] L. E. Cárdenas-Barrón, H. Wee and M. F. Blos, “Solving the vendor-buyer integrated inventory system with arithmetic-geometric inequality,” Mathematical and Computer Modelling, vol. 53, no. 5-6, pp. 991-997, 2011.

[10] J. Teng, L. E. Cárdenas-Barrón and K. Lou, “The economic lot size of the integrated vendor-buyer inventory system derived without derivatives: A simple derivation,” Applied Mathematics and Computation, vol. 217, no. 12, pp. 5972-5977, 2011.

[11] H. M. Wee and C. J. Chung, “A note on the economic lot size of the integrated vendor–buyer inventory system derived without derivatives,” European Journal of Operational Research, vol. 177, no. 2, pp. 1289–1293, 2007.

[12] G. A. Widyadana, L. E, Cárdenas-Barrón and H. M., Wee, “Economic order quantity model for deteriorating items with planned backorder level,” Mathematical and Computer Modelling, vol. 54, no. 5-6, pp. 1569-1575, 2011.

[13] R. Zhang, I. Kaku and Y. Xiao, “Model and heuristic algorithm of the joint replenishment problem with complete backordering and correlated demand,” International Journal of Production Economics, vol. 139, no. 1, pp. 33-41, 2012.

[14] K. Chung, “The EOQ model with defective items and partially permissible delay in payments linked to order quantity derived analytically in the supply chain management,” Applied Mathematical Modelling, vol. 37, no. 4, pp. 2317-2326, 2013.

[15] A. Gambini, G. Mingari Scarpello and D. Ritelli, “Mathematical properties of EOQ models with special cost structure,” Applied Mathematical Modelling, vol. 37, no. 3, (2013) 659-666.

[16] A. Andriolo, D. Battini, R. W. Grubbström, A. Persona and F. Sgarbossa, “A century of evolution from Harris's basic lot size model: Survey and research agenda,” International Journal of Production Economics, vol. 155, pp. 16-38, 2014.

[17] L. A. San-José, J. Sicilia and J. García-Laguna, “Optimal lot size for a production-inventory system with partial backlogging and mixture of dispatching policies,” International Journal of Production Economics, vol. 155, pp. 194-203, 2014.

[18] G. P. Sphicas, “Generalized EOQ formula using a new parameter: Coefficient of backorder attractiveness,” International Journal of Production Economics, vol. 155, pp. 143-147, 2014.