论文信息 - Optimal control of discrete event systems under partial observation

Optimal control of discrete event systems under partial observation

We are interested in a class of optimal control problems for discrete event systems (DES). We adopt the formalism of supervisory control theory and model the system as a finite state machine (FSM). Our control problem is characterized by the presence of uncontrollable as well as unobservable events, the notion of occurrence and control costs for events and a worst-case objective function. We first derive an observer for the partially unobservable FSM, which allows us to construct an approximation of the unobservable trajectory costs. We define the performance measure on this observer rather than on the original FSM itself. Further, we use the algorithm of Sengupta and Lafortune (1998) to synthesize an optimal submachine of the observer. This submachine leads to the desired supervisor for the system.

S. Lafortune | H. Marchand | O. Boivineau

[1] R. Sengupta,et al. Extensions to the Theory of Optimal Control of Discrete Event Systems , 1993 .

[2] W. M. Wonham,et al. The control of discrete event systems , 1989 .

[3] Raja Sengupta. Optimal control of discrete event systems , 1995 .

[4] Walter Murray Wonham,et al. On observability of discrete-event systems , 1988, Inf. Sci..

[5] Christos G. Cassandras,et al. Introduction to Discrete Event Systems , 1999, The Kluwer International Series on Discrete Event Dynamic Systems.

[6] Stéphane Lafortune,et al. On the synthesis of optimal schedulers in discrete event control problems with multiple goals , 1998, SMC'98 Conference Proceedings. 1998 IEEE International Conference on Systems, Man, and Cybernetics (Cat. No.98CH36218).

[7] R. Sengupta,et al. An Optimal Control Theory for Discrete Event Systems , 1998 .

[8] K. Passino,et al. On the optimal control of discrete event systems , 1989, Proceedings of the 28th IEEE Conference on Decision and Control,.

[9] Kemal Inan. Nondeterministic supervision under partial observations , 1994 .

[10] Michel Le Borgne. ON THE OPTIMAL CONTROL OF POLYNOMIAL DYNAMICAL , 1998 .

[11] P. Ramadge,et al. Supervisory control of a class of discrete event processes , 1987 .

[12] Steven I. Marcus,et al. On supremal languages of classes of sublanguages that arise in supervisor synthesis problems with partial observation , 1989, Math. Control. Signals Syst..