Approximate dynamic programming modeling for a typical blood platelet bank

It addresses some of the literature gaps and overcome curse of dimension problem.The model considers eight blood types with stochastic demand, stochastic supply.It uses news vendor model and the current inventory to control the supply uncertainty.It uses linear programing to solve the single-period inventory model optimally.It uses ADP to solve the multi-period model without any downsizing. This paper introduces a workable model for the establishment of an inventory bank holding perishable blood platelets with a short shelf life. The model considers a blood platelet bank with eight blood types, stochastic demand, stochastic supply, and deterministic lead time. The model is formulated using approximate dynamic programming. The model is evaluated in terms of four measures of effectiveness: blood platelet shortage, outdating, inventory level, and reward gained. Moreover, several alternative inventory control policies are analyzed. The order quantity decision is taken using a news-vendor model. In addition, the variation of the O- percentage is studied. This study confirms that the blood platelet bank reward can be maximized by operating at the optimal inventory level, thereby minimizing the number of outdated units as well as shortages. In addition, the suitable O- percentage within the blood platelet bank inventory was studied. As the O- blood type inventory levels increase to 40%, shortages drop from 3.9% to 1.5%. Outdated units drop from 4.6% to 1.8%. Furthermore, when the order quantity is received twice a day, shortages drop to 1.8% and outdated units drop to 2.1%.

[1]  John T Blake On the use of Operational Research for managing platelet inventory and ordering , 2009, Transfusion.

[2]  J. Wal,et al.  Blood platelet production with breaks : optimization by SDP and simulation , 2009 .

[3]  Warren B. Powell,et al.  Dynamic-Programming Approximations for Stochastic Time-Staged Integer Multicommodity-Flow Problems , 2006, INFORMS J. Comput..

[4]  Jeroen Belien,et al.  Supply chain management of blood products: A literature review , 2012 .

[5]  Jeroen Beliën,et al.  Supply chain management of blood products: A literature review , 2012, Eur. J. Oper. Res..

[6]  Gregory P. Prastacos LIFO Distribution Systems , 1979 .

[7]  Scott Murphy,et al.  Platelets from pooled buffy coats: an update , 2005, Transfusion.

[8]  Gregory P. Prastacos Optimal Myopic Allocation of a Product with Fixed Lifetime , 1978 .

[9]  Warren B. Powell,et al.  A Tour of the Jungle of Approximate Dynamic Programming , 2011 .

[10]  A. Giulivi,et al.  Contingency plan implementation. , 2012, Transfusion and apheresis science : official journal of the World Apheresis Association : official journal of the European Society for Haemapheresis.

[11]  Parviz Ghandforoush,et al.  A DSS to manage platelet production supply chain for regional blood centers , 2010, Decis. Support Syst..

[12]  Warrren B Powell,et al.  Convergence Proofs of Least Squares Policy Iteration Algorithm for High-Dimensional Inflnite Horizon Markov Decision Process Problems , 2008 .

[13]  Douglas C. Montgomery,et al.  A statistical Markov chain approximation of transient hospital inpatient inventory , 2010, Eur. J. Oper. Res..

[14]  Jan van der Wal,et al.  Blood platelet production: Optimization by dynamic programming and simulation , 2007, Comput. Oper. Res..

[15]  Warrren B Powell,et al.  Value Function Approximation using Multiple Aggregation for Multiattribute Resource Management , 2008 .

[16]  Warren B. Powell,et al.  An Optimal Approximate Dynamic Programming Algorithm for the Lagged Asset Acquisition Problem , 2009, Math. Oper. Res..

[17]  A J Katz,et al.  Simulation Analysis of Platelet Production and Inventory Management , 1983, Vox sanguinis.

[18]  Richard Wilding,et al.  Blood inventory management: hospital best practice. , 2012, Transfusion medicine reviews.

[19]  Warren B. Powell,et al.  Adaptive stepsizes for recursive estimation with applications in approximate dynamic programming , 2006, Machine Learning.

[20]  Steven Nahmias On ordering perishable inventory under erlang demand , 1975 .

[21]  Warren B. Powell,et al.  Approximate Dynamic Programming: Solving the Curses of Dimensionality (Wiley Series in Probability and Statistics) , 2007 .

[22]  Warren B. Powell,et al.  “Approximate dynamic programming: Solving the curses of dimensionality” by Warren B. Powell , 2007, Wiley Series in Probability and Statistics.

[23]  Warren B. Powell,et al.  Feature Article - Merging AI and OR to Solve High-Dimensional Stochastic Optimization Problems Using Approximate Dynamic Programming , 2010, INFORMS J. Comput..

[24]  S. Glynn,et al.  First‐time blood donors: demographic trends , 2001, Transfusion.

[25]  Warren B. Powell,et al.  A Distributed Decision-Making Structure for Dynamic Resource Allocation Using Nonlinear Functional Approximations , 2005, Oper. Res..

[26]  L. C. Leung,et al.  Inventory Management of Platelets in Hospitals: Optimal Inventory Policy for Perishable Products with Regular and Optional Expedited Replenishments , 2011 .

[27]  Michael Schober,et al.  The detection of platelet antibodies by simultaneous analysis of specific platelet antibodies and the monoclonal antibody–specific immobilization of platelet antigens: an interlaboratory comparison , 2010, Transfusion.

[28]  Louis Anthony Cox,et al.  Wiley encyclopedia of operations research and management science , 2011 .

[29]  Steven Nahmias,et al.  Perishable Inventory Theory: A Review , 1982, Oper. Res..

[30]  Steven Nahmias,et al.  Optimal Ordering Policies for Perishable Inventory - II , 1975, Oper. Res..

[31]  Gregory P. Prastacos,et al.  On the Evaluation of a Class of Inventory Policies for Perishable Products Such as Blood , 1975 .

[32]  Warren B. Powell,et al.  Approximate dynamic programming: Lessons from the field , 2008, 2008 Winter Simulation Conference.

[33]  Feryal Erhun,et al.  Age of blood as a limitation for transfusion: potential impact on blood inventory and availability , 2009, Transfusion.

[34]  Warren B. Powell,et al.  An Adaptive Dynamic Programming Algorithm for Dynamic Fleet Management, I: Single Period Travel Times , 2002, Transp. Sci..

[35]  Warren B. Powell,et al.  Approximate dynamic programming for high dimensional resource allocation problems , 2005 .