Optimal and Heuristic Echelon (r, nQ, T) Policies in Serial Inventory Systems with Fixed Costs

Published Online:https://doi.org/10.1287/opre.1090.0734

References

  • Axsäter S., Graves S. C., de Kok T. Supply chain operations: Serial and distribution inventory systems. Supply Chain Management: Design, Coordination and Operation, Vol. 11: Handbooks in Operations Research and Management Science (2003) (Elsevier, Amsterdam) 525–559Chapter 10CrossrefGoogle Scholar
  • Axsäter S., Rosling K. Installation vs. echelon stock policies for multi-level inventory control. Oper. Res. (1993) 39:1274–1280Google Scholar
  • Cachon G. Managing supply chain demand variability with scheduled ordering policies. Management Sci. (1999) 45:843–856LinkGoogle Scholar
  • Chao X., Zhou S. X. Optimal policy for a multiechelon inventory system with batch ordering and fixed replenishment intervals. Oper. Res. (2009) 57(2):377–390LinkGoogle Scholar
  • Chen F., Tayur S., Ganeshan R., Magazine M. On (R, nQ) policies in serial inventory systems. Quantitative Models for Supply Chain Management (1998a) (Kluwer Academic Publishers, Norwell, MA) 71–110Google Scholar
  • Chen F. Stationary policies in multiechelon inventory systems with deterministic demand and backlogging. Oper. Res. (1998b) 46:S26–S34LinkGoogle Scholar
  • Chen F. Optimal policies for multi-echelon inventory problems with batch ordering. Oper. Res. (2000) 48:376–389LinkGoogle Scholar
  • Chen F., Zheng Y.-S. Evaluating echelon stock (R, nQ) policies in serial production/inventory systems with stochastic demand. Management Sci. (1994) 40:1262–1275LinkGoogle Scholar
  • Chen F., Zheng Y.-S. Near-optimal echelon-stock (R, nq) policies in multistage serial systems. Oper. Res. (1998) 46:592–602LinkGoogle Scholar
  • De Bodt M., Graves S. Continuous review policies for a multi-echelon inventory problem with stochastic demand. Management Sci. (1985) 31:1286–1295LinkGoogle Scholar
  • Feng K., Rao U. Echelon-stock (R, nT) control in two-stage serial stochastic inventory systems. Oper. Res. Lett. (2007) 35:95–104CrossrefGoogle Scholar
  • Graves S. A multiechelon inventory model with fixed replenishment intervals. Management Sci. (1996) 42:1–18LinkGoogle Scholar
  • Hadley G., Whitin T.Analysis of Inventory Systems (1963) (Prentice-Hall, Englewood Cliffs, NJ) Google Scholar
  • Kiesmüller G. P., de Kok A. G. The customer waiting time in an (R, s, Q) inventory system. Internat. J. Production Econom. (2006) 104:354–364CrossrefGoogle Scholar
  • Larson C., Kiesmüller G. P. Developing a closed-form cost expression for an (R, s, nQ) policy where the demand process is compound generalized Erlang. Oper. Res. Lett. (2007) 35:567–572CrossrefGoogle Scholar
  • Maxwell W., Muckstadt J. Establishing consistent and realistic reorder intervals in production-distribution systems. Oper. Res. (1985) 33:1316–1341LinkGoogle Scholar
  • Rao U. Properties of the period review (R, T) inventory control policy for stationary, stochastic demand. Manufacturing Service Oper. Management (2003) 5:37–53LinkGoogle Scholar
  • Roundy R. 98%-effective integer-ratio lot-sizing for one-warehouse multi-retailer systems. Management Sci. (1985) 31:1416–1430LinkGoogle Scholar
  • Shang K. Note: A simple heuristic for serial inventory systems with fixed order costs. Oper. Res. (2008) 56:1039–1043LinkGoogle Scholar
  • Shang K., Song J.-S. Serial supply chains with economies of scale: Bounds and approximations. Oper. Res. (2007) 55:843–853LinkGoogle Scholar
  • van Houtum G.-J., Scheller-Wolf A., Yi J. Optimal control of serial inventory systems with fixed replenishment intervals. Oper. Res. (2007) 55:674–687LinkGoogle Scholar
  • Wolff R. W. Poisson arrivals see time averages. Oper. Res. (1982) 30:223–231LinkGoogle Scholar
  • Zheng Y.-S. On properties of stochastic inventory systems. Management Sci. (1992) 38:87–103LinkGoogle Scholar
  • Zheng Y.-S., Chen F. Inventory policies with quantized ordering. Naval Res. Logist. (1992) 39:285–305CrossrefGoogle Scholar
  • Zipkin P. Inventory service-level measures: Convexity and approximation. Management Sci. (1986) 32:975–981LinkGoogle Scholar
  • Zipkin P.Foundations of Inventory Management (2000) (McGraw-Hill, New York) Google Scholar
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