On the Effectiveness of Zero-Inventory-Ordering Policies for the Economic Lot-Sizing Model with a Class of Piecewise Linear Cost Structures

We consider an economic lot-sizing problem with a special class of piecewise linear ordering costs, which we refer to as the class of modified all-unit discount cost functions. Such an ordering cost function represents transportation costs charged by many less-than truckload carriers. We show that even special cases of the lot-sizing problem are NP-hard and therefore analyze the effectiveness of easily implementable policies. In particular, we demonstrate that there exists a zero-inventory-ordering(ZIO) policy, i.e., a policy in which an order is placed only when the inventory level drops to zero, whose total inventory and ordering cost is no more than 4/3 times the optimal cost. Furthermore, if the ordering cost function does not vary over time, then the cost of the best ZIO policy is no more than 5/6 4/6 times the optimal cost. These results hold for any transportation and holding cost functions that satisfy the following properties: (i) they are non decreasing functions, and (ii) the associated cost per unit is non increasing. Finally, we report on a numerical study that shows the effectiveness of ZIO policies on a set of test problems.

[1]  Charles Tilly Strikes, wars, and revolutions in an international perspective: Theories and realities , 1989 .

[2]  Jiefeng Xu,et al.  The dynamic lot size model with quantity discount: Counterexamples and correction , 1998 .

[3]  Richard W. Cuthbertson,et al.  The Logic of Logistics: Theory, Algorithms and Applications for Logistics Management , 1998, J. Oper. Res. Soc..

[4]  Steven Nahmias,et al.  Production and operations analysis , 1992 .

[5]  A. Federgruen,et al.  The dynamic lot size model with quantity discount , 1990 .

[6]  Alok Aggarwal,et al.  Improved Algorithms for Economic Lot Size Problems , 1993, Oper. Res..

[7]  Albert P. M. Wagelmans,et al.  Fully Polynomial Approximation Schemes for Single-Item Capacitated Economic Lot-Sizing Problems , 2001, Math. Oper. Res..

[8]  Harvey M. Wagner,et al.  Dynamic Version of the Economic Lot Size Model , 2004, Manag. Sci..

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

[10]  A. Federgruen,et al.  A Simple Forward Algorithm to Solve General Dynamic Lot Sizing Models with n Periods in 0n log n or 0n Time , 1991 .

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

[12]  Albert P. M. Wagelmans,et al.  Economic Lot Sizing: An O(n log n) Algorithm That Runs in Linear Time in the Wagner-Whitin Case , 1992, Oper. Res..

[13]  Dong X. Shaw,et al.  An Algorithm for Single-Item Capacitated Economic Lot Sizing with Piecewise Linear Production Costs and General Holding Costs , 1998 .