Distributed consensus in noncooperative inventory games

This paper deals with repeated nonsymmetric congestion games in which the players cannot observe their payoffs at each stage. Examples of applications come from sharing facilities by multiple users. We show that these games present a unique Pareto optimal Nash equilibrium that dominates all other Nash equilibria and consequently it is also the social optimum among all equilibria, as it minimizes the sum of all the players' costs. We assume that the players adopt a best response strategy. At each stage, they construct their belief concerning others probable behavior, and then, simultaneously make a decision by optimizing their payoff based on their beliefs. Within this context, we provide a consensus protocol that allows the convergence of the players' strategies to the Pareto optimal Nash equilibrium. The protocol allows each player to construct its belief by exchanging only some aggregate but sufficient information with a restricted number of neighbor players. Such a networked information structure has the advantages of being scalable to systems with a large number of players and of reducing each player's data exposure to the competitors.

[1]  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 .

[2]  Peter M. Kort,et al.  Optimal pricing and inventory policies: Centralized and decentralized decision making , 2002, Eur. J. Oper. Res..

[3]  Richard M. Murray,et al.  Consensus problems in networks of agents with switching topology and time-delays , 2004, IEEE Transactions on Automatic Control.

[4]  Sven Axsäter,et al.  A framework for decentralized multi-echelon inventory control , 2001 .

[5]  E. Friedman Dynamics and Rationality in Ordered Externality Games , 1996 .

[6]  T. Başar,et al.  Dynamic Noncooperative Game Theory, 2nd Edition , 1998 .

[7]  M. Fiedler Algebraic connectivity of graphs , 1973 .

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

[9]  A. Watts Uniqueness of equilibrium in cost sharing games , 2002 .

[10]  Jeff S. Shamma,et al.  Dynamic fictitious play, dynamic gradient play, and distributed convergence to Nash equilibria , 2005, IEEE Transactions on Automatic Control.

[11]  Richard M. Murray,et al.  Information flow and cooperative control of vehicle formations , 2004, IEEE Transactions on Automatic Control.

[12]  Ariel Rubinstein,et al.  A Course in Game Theory , 1995 .

[13]  Gordon F. Royle,et al.  Algebraic Graph Theory , 2001, Graduate texts in mathematics.

[14]  I. Milchtaich,et al.  Congestion Games with Player-Specific Payoff Functions , 1996 .

[15]  Gérard P. Cachon Stock Wars: Inventory Competition in a Two-Echelon Supply Chain with Multiple Retailers , 2001, Oper. Res..

[16]  K. Brown,et al.  Graduate Texts in Mathematics , 1982 .

[17]  Chung-Yee Lee,et al.  Stock Replenishment and Shipment Scheduling for Vendor-Managed Inventory Systems , 2000 .

[18]  Yoav Shoham,et al.  Fast and Compact: A Simple Class of Congestion Games , 2005, AAAI.

[19]  Moshe Dror,et al.  Cores of Inventory Centralization Games , 2000, Games Econ. Behav..

[20]  Jan Fransoo,et al.  Multi-echelon multi-company inventory planning with limited information exchange , 2001, J. Oper. Res. Soc..

[21]  Martin W. P. Savelsbergh,et al.  The Stochastic Inventory Routing Problem with Direct Deliveries , 2002, Transp. Sci..

[22]  Judith Timmer,et al.  Inventory games , 2004, Eur. J. Oper. Res..

[23]  Hau L. Lee,et al.  Decentralized Multi-Echelon Supply Chains: Incentives and Information , 1999 .

[24]  T. Başar,et al.  Dynamic Noncooperative Game Theory , 1982 .

[25]  Qinan Wang,et al.  Coordinating Independent Buyers in a Distribution System to Increase a Vendor's Profits , 2001, Manuf. Serv. Oper. Manag..

[26]  Franco Blanchini,et al.  Control of production-distribution systems with unknown inputs and system failures , 1998, Proceedings of the 37th IEEE Conference on Decision and Control (Cat. No.98CH36171).

[27]  Laura Giarré,et al.  Non-linear protocols for optimal distributed consensus in networks of dynamic agents , 2006, Syst. Control. Lett..

[28]  Richard B. Vinter,et al.  The application of dynamic programming to optimal inventory control , 2004, IEEE Transactions on Automatic Control.

[29]  Charles J. Corbett,et al.  Stochastic Inventory Systems in a Supply Chain with Asymmetric Information: Cycle Stocks, Safety Stocks, and Consignment Stock , 2001, Oper. Res..

[30]  R. Rosenthal A class of games possessing pure-strategy Nash equilibria , 1973 .

[31]  Berthold Vöcking Congestion Games: Optimization in Competition , 2006, ACiD.

[32]  H. Peyton Young,et al.  Individual Strategy and Social Structure , 2020 .

[33]  T.C.E. Cheng,et al.  Modelling the benefits of information sharing-based partnerships in a two-level supply chain , 2002, J. Oper. Res. Soc..