论文信息 - Periodic Orbits in a Class of Re-Entrant Manufacturing Systems

Periodic Orbits in a Class of Re-Entrant Manufacturing Systems

Queue changes associated with each step of a manufacturing system are modeled by constant vector fields (fluid model of a queueing network). Observing these vector fields at fixed events reduces them to a set of piecewise linear maps. It is proved that these maps show only periodic or eventually periodic orbits. An algorithm to determine the period of the orbits is presented. The dependence of the period on the processing rates is shown for a 3(4)-step, 2-machine problem.

Dieter Armbruster | Tom Taylor | Ivonne Diaz-Rivera

[1] J. Yorke,et al. Chaos: An Introduction to Dynamical Systems , 1997 .

[2] P. R. Kumar,et al. Distributed scheduling based on due dates and buffer priorities , 1991 .

[3] C. Zhou,et al. The QNET Method for Re-Entrant Queueing Networks with Priority Disciplines , 1997, Oper. Res..

[4] James A. Walsh,et al. Computer protocol and torus maps , 1996 .

[5] G. J. A. Stern,et al. Queueing Systems, Volume 2: Computer Applications , 1976 .

[6] Gideon Weiss,et al. Stability and Instability of Fluid Models for Reentrant Lines , 1996, Math. Oper. Res..

[7] T. Beaumariage,et al. The nature and origin of chaos in manufacturing systems , 1994, Proceedings of 1994 IEEE/SEMI Advanced Semiconductor Manufacturing Conference and Workshop (ASMC).

[8] P. R. Kumar,et al. Re-entrant lines , 1993, Queueing Syst. Theory Appl..

[9] Ronald W. Wolff,et al. Stochastic Modeling and the Theory of Queues , 1989 .

[10] C Chase,et al. Periodicity and Chaos from Switched Ow Systems: Contrasting Examples of Discretely Controlled Continuous Systems, Ieee , .

[11] Sean P. Meyn,et al. Stability of queueing networks and scheduling policies , 1993, Proceedings of 32nd IEEE Conference on Decision and Control.