AN (S − 1, S) Inventory System with Fixed Shelf Life and Constant Lead Times

Published Online:https://doi.org/10.1287/opre.46.3.S65

References

  • Graves S. C. The applications of queueing theory to continuous perishable inventory systems. Management Sci. (1982) 28 400 406 LinkGoogle Scholar
  • Kaspi H. , Perry D. Inventory systems of perishable commodities. Adv. Appl. Probab. (1983) 15 674 685 CrossrefGoogle Scholar
  • Kaspi H. , Perry D. Inventory systems for perishable commodities with renewal input and poisson output. Adv. Appl. Probab. (1984) 16 402 421 CrossrefGoogle Scholar
  • Moinzadeh K. , Schmidt C. P. An (S − 1, S) inventory system with emergency orders. Opns. Res. (1991) 39 308 321 LinkGoogle Scholar
  • Perry D. , Asmussen S. Rejection rules in the M/G/1 queue. Questa (1995) 19 105 130 Google Scholar
  • Perry D. , Posner M. J. M. Control policies for two classes of inventory systems via a duality equivalence relationship. Probab. Engrg. Inform. Sci. (1989) 3 561 579 CrossrefGoogle Scholar
  • Perry D. , Posner M. J. M. Control of input and demand rates in inventory systems of perishable commodities. Naval Res. Logist. (1990) 37 85 97 CrossrefGoogle Scholar
  • Schmidt C. P. , Nahmias S. (S − 1, S) policies for perishable inventory. Management Sci. (1985) 31 719 728 LinkGoogle Scholar
  • Sherbrooke C. C. METRIC: A multi-echelon technique for recoverable item inventory control. Opns. Res. (1968) 16 122 141 LinkGoogle Scholar
  • Smith S. A. Optimal inventories for an (S − 1, S) system with no backorders. Management Sci. (1977) 23 522 528 LinkGoogle Scholar
  • Wolff R. Stochastic Modeling and the Theory of Queues (1988) (Academic Press, New York) Google Scholar
INFORMS site uses cookies to store information on your computer. Some are essential to make our site work; Others help us improve the user experience. By using this site, you consent to the placement of these cookies. Please read our Privacy Statement to learn more.