Stability and Chaos in Input Pricing for a Service Facility with Adaptive Customer Response to Congestion

We consider the stability of the equilibrium arrival rate and equilibrium admission price at a service facility, using a generalization of an input-pricing model introduced by Dewan and Mendelson and further examined by Stidham. At the equilibrium, the marginal value of service equals the admission price, that is, the sum of the admission fee and the expected delay cost. Stability means (roughly) that the system returns to the equilibrium after a perturbation, assuming the customers base their join/balk decisions on previous prices. We extend the discrete-time, dynamic-system pricing model of Stidham to allow adaptive expectations in which customers predict the future price based on a convex combination of the current price and the previous prediction. We show that this can lead to chaotic behavior when the equilibrium is unstable. That is, the price and arrival rate can follow aperiodic orbits, which appear to be completely random. Our results suggest an alternative explanation for observed variations in the mean arrival rate to a queueing system, which are often modeled by means of a random exogenous (e.g., Markovian) environment process.

[1]  W. Whitt Large Fluctuations in a Deterministic Multiclass Network of Queues , 1993 .

[2]  Eric J. Friedman,et al.  Short run dynamics of multi-class queues , 1993, Oper. Res. Lett..

[3]  Andreas D. Bovopoulos,et al.  Asynchronous Algorithms for Optimal Flow Control of BCMP Networks , 1989 .

[4]  K. Bharath-Kumar,et al.  A new approach to performance-oriented flow control , 1981, IEEE Trans. Commun..

[5]  Carl M. Harris,et al.  Fundamentals of queueing theory (2nd ed.). , 1985 .

[6]  Jeffrey M. Jaffe,et al.  Flow Control Power is Nondecentralizable , 1981, IEEE Trans. Commun..

[7]  Derya Cansever,et al.  Decentralized algorithms for flow control in networks , 1986, 1986 25th IEEE Conference on Decision and Control.

[8]  C. Chiarella The cobweb model , 1988 .

[9]  Carl Chiarella,et al.  The cobweb model: Its instability and the onset of chaos , 1988 .

[10]  R. Devaney An Introduction to Chaotic Dynamical Systems , 1990 .

[11]  P. Ramadge,et al.  Periodicity and chaos from switched flow systems: contrasting examples of discretely controlled continuous systems , 1993, IEEE Trans. Autom. Control..

[12]  M. Feigenbaum Universal behavior in nonlinear systems , 1983 .

[13]  H. Mendelson,et al.  User delay costs and internal pricing for a service facility , 1990 .

[14]  J. Yorke,et al.  Period Three Implies Chaos , 1975 .

[15]  H. Lorenz Nonlinear Dynamical Economics and Chaotic Motion , 1989 .

[16]  Carl M. Harris,et al.  Fundamentals of queueing theory , 1975 .

[17]  Jr. Shaler Stidham Pricing and capacity decisions for a service facility: stability and multiple local optima , 1992 .

[18]  Christos Douligeris,et al.  Convergence of synchronous and asynchronous algorithms in multiclass networks , 1991, IEEE INFCOM '91. The conference on Computer Communications. Tenth Annual Joint Comference of the IEEE Computer and Communications Societies Proceedings.

[19]  C. Doubligeris,et al.  A game theoretic approach to flow control in an integrated environment with two classes of users , 1988, [1988] Proceedings. Computer Networking Symposium.