An (R, S) Based Heuristic Model for the Stochastic Joint Replenishment Problem

This paper considers the periodic-review stochastic joint replenishment problem (JRP) under Bookbinder and Tan's static-dynamic uncertainty control policy. According to a static-dynamic uncertainty control rule, the decision maker fixes timing of replenishments once and for all at the beginning of the planning horizon, the inventory position is then raised to a predefined order-up-to-position at the beginning of each replenishment period. In this policy, freezing the replenishment times ameliorates the inherent difficulties pertinent to replenishment coordination of multiple products, whereas dynamic order quantities facilitate dealing with uncertain demands. We adapt and extend an earlier mixed integer linear programming (MILP) model for computing static-dynamic uncertainty policy parameters, and demonstrate that the same can be used to approximate the optimal control rule for the JRP, also known as $(\sigma, \vec{S})$ policy. An extensive computational study illustrates the effectiveness of our approach when compared to alternative approaches in the literature.

[1]  Enis Kayis,et al.  A note on the can-order policy for the two-item stochastic joint-replenishment problem , 2008 .

[2]  E. Silver A Simple Method of Determining Order Quantities in Joint Replenishments Under Deterministic Demand , 1976 .

[3]  Roberto Rossi,et al.  O C ] 1 3 A ug 2 01 3 Piecewise linear approximations of the standard normal first order loss function , 2013 .

[4]  Roberto Rossi,et al.  An efficient computational method for a stochastic dynamic lot-sizing problem under service-level constraints , 2011, Eur. J. Oper. Res..

[5]  Moncer Hariga,et al.  Two New Heuristic Procedures for the Joint Replenishment Problem , 1994 .

[6]  Guillermo Gallego,et al.  K-Convexity in Rn , 2005 .

[7]  Ronald G. Askin A Procedure for Production Lot Sizing with Probabilistic Dynamic Demand , 1981 .

[8]  Katsuhisa Ohno,et al.  A multi-item continuous review inventory system with compound Poisson demands , 2001, Math. Methods Oper. Res..

[9]  Dieter Kalin,et al.  On the Optimality of (σ, S) Policies , 1980, Math. Oper. Res..

[10]  Ş. Tarim,et al.  The stochastic dynamic production/inventory lot-sizing problem with service-level constraints , 2004 .

[11]  Edward A. Silver,et al.  A Procedure, Involving Simulation, For Selecting The Control Variables Of An (S, c, s) Joint Ordering Strategy* , 1972 .

[12]  Brian G. Kingsman,et al.  Production, Manufacturing and Logistics Modelling and computing (R n ,S n ) policies for inventory systems with non-stationary stochastic demand , 2005 .

[13]  Awi Federgruen,et al.  Finding Optimal (s, S) Policies Is About As Simple As Evaluating a Single Policy , 1991, Oper. Res..

[14]  S. Deshmukh,et al.  Discussion A note on ‘The economic ordering quantity for jointly replenishing items’ , 1993 .

[15]  Søren Glud Johansen,et al.  Can-order policy for the periodic-review joint replenishment problem , 2003, J. Oper. Res. Soc..

[16]  Roberto Rossi,et al.  Piecewise linear approximations for the static-dynamic uncertainty strategy in stochastic lot-sizing , 2013, ArXiv.

[17]  Suresh Kumar Goyal,et al.  Joint replenishment inventory control: Deterministic and stochastic models , 1989 .

[18]  James H. Bookbinder,et al.  Strategies for the Probabilistic Lot-Sizing Problem with Service-Level Constraints , 1988 .

[19]  Graham K. Rand,et al.  Decision Systems for Inventory Management and Production Planning , 1979 .

[20]  David F. Pyke,et al.  Inventory management and production planning and scheduling , 1998 .

[21]  Anders Segerstedt,et al.  A new iterative heuristic to solve the joint replenishment problem using a spreadsheet technique , 2007 .

[22]  Ellis L. Johnson Optimality and Computation of (\sigma, S) Policies in the Multi-Item Infinite Horizon Inventory Problem , 1967 .

[23]  Suresh Goyal,et al.  A review of the joint replenishment problem literature: 1989-2005 , 2008, Eur. J. Oper. Res..

[24]  Ali A. Yassine,et al.  JOINT REPLENISHMENT MODEL WITH SUBSTITUTION , 2014 .

[25]  S. Viswanathan Note. Periodic Review s, S Policies for Joint Replenishment Inventory Systems , 1997 .

[26]  Pricha Pantumsinchai A Comparison of Three Joint Ordering Inventory Policies , 1992 .

[27]  Meir J. Rosenblatt,et al.  On the economic ordering quantity for jointly replenished items , 1991 .

[28]  Philip Melchiors,et al.  Calculating can-order policies for the joint replenishment problem by the compensation approach , 2002, Eur. J. Oper. Res..

[29]  Derek A. Atkins,et al.  Periodic Versus Can-Order Policies for Coordinated Multi-Item Inventory Systems , 1988 .

[30]  Burak Eksioglu,et al.  A reformulation for the stochastic lot sizing problem with service-level constraints , 2014, Oper. Res. Lett..

[31]  Jack P. C. Kleijnen,et al.  Analysis and comparison of two strategies for multi-item inventory systems with joint replenishment costs , 1992 .

[32]  Edward A. Silver,et al.  A coordinated inventory control system for compound Poisson demand and zero lead time , 1975 .

[33]  A. Federgruen,et al.  Coordinated Replenishments in a Multi-Item Inventory System with Compound Poisson Demands , 1984 .

[34]  Christina Nielsen,et al.  An analytical study of the Q , 2005, Eur. J. Oper. Res..

[35]  G. Laporte,et al.  Models and algorithms for the dynamic-demand joint replenishment problem , 2004 .

[36]  S. Viswanathan,et al.  A New Optimal Algorithm for the Joint Replenishment Problem , 1996 .

[37]  Denilson Ricardo de Lucena Nunes,et al.  A systematic literature review on the joint replenishment problem solutions: 2006-2015 , 2017 .

[38]  Ulaş Özen,et al.  Static-dynamic uncertainty strategy for a single-item stochastic inventory control problem , 2012 .

[39]  Edward A. Silver,et al.  Establishing reorder points in the (S,c,s) coordinated control system under compound Poisson demand , 1981 .

[40]  Joseph L. Balintfy,et al.  On a Basic Class of Multi-Item Inventory Problems , 1964 .

[41]  Katsuhisa Ohno,et al.  A new algorithm for a multi-item periodic review inventory system , 1994, Math. Methods Oper. Res..

[42]  Banu Yüksel Özkaya,et al.  The stochastic joint replenishment problem: A new policy, analysis, and insights , 2006 .

[43]  E. Ignall Optimal Continuous Review Policies for Two Product Inventory Systems with Joint Setup Costs , 1969 .

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

[45]  S. Kalpakam,et al.  A coordinated multicommodity (s, S) inventory system , 1993 .

[46]  E. Silver A control system for coordinated inventory replenishment , 1974 .