论文信息 - The order-up-to policy "sweet spot": using proportional controllers to eliminate the bullwhip problem

The order-up-to policy "sweet spot": using proportional controllers to eliminate the bullwhip problem

We develop a discrete control theory model of a stochastic demand pattern with both Auto Regressive and Moving Average (ARMA) components. We show that the bullwhip effect arises when the myopic Order-Up-To (OUT) policy is used. This policy is optimal when the ordering cost is linear. We then derive a set of z-transform transfer functions of a modified policy that allows us to avoid the bullwhip problem by incorporating a proportional controller into the inventory position feedback loop. With this technique, the order variation can be reduced to the same level as the demand variation. However, bullwhip-effect avoidance in our policy always comes at the costs of holding extra inventory. When the ordering cost is piece -wise linear and increasing, we compare the total cost per period under the two types of ordering policies: with and without bullwhip - effect reduction. Numerical examples reveal that the cost saving can be substantial if order variance is reduced using the proportional controller.

Stephen Michael Disney | Y. F. Chen | S. Disney | Y. F. Chen

[1] Christopher S. Tang,et al. The Value of Information Sharing in a Two-Level Supply Chain , 2000 .

[2] S. Disney,et al. On the bullwhip and inventory variance produced by an ordering policy , 2003 .

[3] Frank Y. Chen,et al. Quantifying the Bullwhip Effect in a Simple Supply Chain: The Impact of Forecasting, Lead Times, and Information.: The Impact of Forecasting, Lead Times, and Information. , 2000 .

[4] Kenneth Gilbert,et al. An ARIMA Supply Chain Model , 2005, Manag. Sci..

[5] I︠a︡. Z. T︠S︡ypkin. Sampling systems theory and its application , 1965 .

[6] Vineet Padmanabhan,et al. Comments on "Information Distortion in a Supply Chain: The Bullwhip Effect" , 1997, Manag. Sci..

[7] Richard D. Metters,et al. Quantifying the bullwhip effect in supply chains , 1997 .

[8] Norman S. Nise,et al. Control Systems Engineering , 1991 .

[9] C. Carlsson,et al. A fuzzy approach to the bullwhip effect , 2000 .

[10] M. Lambrecht,et al. Transfer function analysis of forecasting induced bullwhip in supply chains , 2002 .

[11] Howard E. Thompson,et al. Optimality of Myopic Inventory Policies for Certain Dependent Demand Processes , 1975 .

[12] S. Karlin. Dynamic Inventory Policy with Varying Stochastic Demands , 1960 .

[13] Gwilym M. Jenkins,et al. Time series analysis, forecasting and control , 1971 .