One-for-One Period Policy and its Optimal Solution

In this paper we introduce the optimal solution for a simple and yet practical inventory policy with the important characteristic which eliminates the uncertainty in demand for suppliers. In this new policy which is different from the classical inventory policies, the time interval between any two consecutive orders is fixed and the quantity of each order is one. Assuming the fixed ordering costs are negligible, lead times are constant, and demand forms a Poisson process, we use queuing theory concepts to derive the long-run average total inventory costs, consisting of holding and shortage costs in terms of the average inventory. We show that the total cost rate has the important property of being entirely free of the lead time. We prove that the average total cost rate is a convex function and thus has a unique solution. We, then derive the relation for the optimal value of the time interval between any two consecutive orders. Finally we present a numerical example to compare the performance of this new policy with the classical one-for-one ordering policy. The provided example intends to re-examine the optimality of (s, S) policy in continuous review inventory models as well to establish the fact that even for the case where demand forms a Poisson process the optimality does not hold.

[1]  Rolf Forsberg,et al.  Optimization of order-up-to-S policies for two-level inventory systems with compound Poisson demand , 1995 .

[2]  Sven Axsäter,et al.  Exact and Approximate Evaluation of Batch-Ordering Policies for Two-Level Inventory Systems , 1993, Oper. Res..

[3]  Henk Tijms,et al.  Stochastic modelling and analysis: a computational approach , 1986 .

[4]  Sven Axsäter,et al.  Approximating general multi-echelon inventory systems by Poisson models , 1994 .

[5]  Izzet Sahin,et al.  On the Stationary Analysis of Continuous Review (s, S) Inventory Systems with Constant Lead Times , 1979, Oper. Res..

[6]  R. Haji,et al.  A New replenishment Policy in a Two-echelon Inventory System with Stochastic Demand , 2006, 2006 International Conference on Service Systems and Service Management.

[7]  Steven Nahmias,et al.  Optimizing inventory levels in a two-echelon retailer system with partial lost sales , 1994 .

[8]  Awi Federgruen,et al.  An Efficient Algorithm for Computing an Optimal (r, Q) Policy in Continuous Review Stochastic Inventory Systems , 1992, Oper. Res..

[9]  Kamran Moinzadeh,et al.  Operating characteristics of a two‐echelon inventory system for repairable and consumable items under batch ordering and shipment policy , 1987 .

[10]  Steven Nahmias On the equivalence of three approximate continuous review inventory models , 1976 .

[11]  Kamran Moinzadeh,et al.  Two-Parameter Approximations For Multi-Echelon Repairable Inventory Models With Batch Ordering Policy , 1987 .

[12]  Sven Axsäter Approximate Optimization of a Two-Level Distribution Inventory System , 2003 .

[13]  Diptendu Sinha,et al.  Policy and cost approximations of two-echelon distribution systems with a procurement cost at the higher echelon , 1995 .

[14]  Rasoul Haji,et al.  A multi-product continuous review inventory system with stochastic demand, backorders, and a budget constraint , 2004, Eur. J. Oper. Res..

[15]  Carl R. Schultz Replenishment Delays for Expensive Slow-Moving Items , 1989 .

[16]  Richard M. Feldman,et al.  A CONTINUOUS REVIEW (s, S) INVENTORY , 1978 .

[17]  R. Ganeshan Managing supply chain inventories: A multiple retailer, one warehouse, multiple supplier model , 1999 .

[18]  W. Karl Kruse Waiting Time in an S - 1, S Inventory System with Arbitrarily Distributed Lead Times , 1980, Oper. Res..

[19]  Stephen C. Graves,et al.  A Multi-Echelon Inventory Model for a Repairable Item with One-for-One Replenishment , 1985 .

[20]  Steven Nahmias Production and operations analysis -5/E , 2005 .

[21]  Sheldon M. Ross Introduction to Probability Models. , 1995 .

[22]  Blyth C. Archibald Continuous Review s, S Policies with Lost Sales , 1981 .

[23]  L. Zurich,et al.  Operations Research in Production Planning, Scheduling, and Inventory Control , 1974 .

[24]  Kamran Moinzadeh,et al.  A Multi-Echelon Inventory System with Information Exchange , 2002, Manag. Sci..

[25]  D. Iglehart Optimality of (s, S) Policies in the Infinite Horizon Dynamic Inventory Problem , 1963 .

[26]  David K. Smith,et al.  A two-echelon inventory model with lost sales , 2007, Eur. J. Oper. Res..

[27]  Sven Axsäter,et al.  Simple Solution Procedures for a Class of Two-Echelon Inventory Problems , 1990, Oper. Res..

[28]  Rolf Forsberg,et al.  Exact evaluation of (R, Q)-policies for two-level inventory systems with Poisson demand , 1997 .

[29]  Arthur F. Veinott,et al.  Analysis of Inventory Systems , 1963 .

[30]  Martin J. Beckmann,et al.  An Inventory Model for Arbitrary Interval and Quantity Distributions of Demand , 1961 .

[31]  K. Moinzadeh,et al.  Batch size and stocking levels in multi-echelon repairable systems , 1986 .

[32]  Sungwon Jung,et al.  Optimal reorder decision utilizing centralized stock information in a two-echelon distribution system , 2002, Comput. Oper. Res..

[33]  Izzet Sahin,et al.  On the Objective Function Behavior in (s, S) Inventory Models , 1982, Oper. Res..

[34]  Craig C. Sherbrooke,et al.  Metric: A Multi-Echelon Technique for Recoverable Item Control , 1968, Oper. Res..

[35]  Yu-Sheng Zheng On properties of stochastic inventory systems , 1992 .

[36]  Izzet Sahin Regenerative inventory systems , 1990 .

[37]  H. Scarf THE OPTIMALITY OF (S,S) POLICIES IN THE DYNAMIC INVENTORY PROBLEM , 1959 .

[38]  Sven Axsäter,et al.  A joint replenishment policy for multi-echelon inventory control , 1999 .

[39]  Rolf Forsberg Evaluation of (R,Q)-policies for two-level inventory systems with generally distributed customer inter-arrival times , 1997 .

[40]  Johan Marklund,et al.  Centralized inventory control in a two‐level distribution system with Poisson demand , 2002 .

[41]  Isamu Higa,et al.  Waiting Time in an (S - 1, S) Inventory System , 1975, Oper. Res..

[42]  W. Karl Kruse Technical Note - Waiting Time in a Continuous Review (s, S) Inventory System with Constant Lead Times , 1981, Oper. Res..

[43]  Kamran Moinzadeh,et al.  An improved ordering policy for continuous review inventory systems with arbitrary inter-demand time distributions , 2001 .

[44]  Paul H. Zipkin,et al.  Inventory service-level measures: convexity and approximation , 1986 .