Control of Linear Min-plus Systems under Temporal Constraints

We consider a class of controlled timed event graphs subject to strict temporal constraints. Such a graph is deterministic, in the sense that its behaviour only depends on the initial marking and on the control that is applied. This behaviour can be modelled by a system of difference equations that are linear in the Min-Plus algebra. The temporal constraint is represented by an inequality that is also linear in the min-plus algebra. Then, a method for the synthesis of a control law ensuring the respect of constraints is described. We give explicit formulas characterizing a control law, which, if two conditions are satisfied, ensures the validity of the temporal constraints. It is a causal state feedback, involving delays. The method is illustrated on an example.

[1]  Isabel Demongodin,et al.  Sizing, Cycle Time and Plant Control Using Dioid Algebra , 2005 .

[2]  Panos J. Antsaklis,et al.  Feedback control of Petri nets based on place invariants , 1994, Proceedings of 1994 33rd IEEE Conference on Decision and Control.

[3]  Rajeev Alur,et al.  A Theory of Timed Automata , 1994, Theor. Comput. Sci..

[4]  M. Diaz,et al.  Modeling and Verification of Time Dependent Systems Using Time Petri Nets , 1991, IEEE Trans. Software Eng..

[5]  V.K. Garg,et al.  Control of event separation times in discrete event systems , 1995, Proceedings of 1995 34th IEEE Conference on Decision and Control.

[6]  Geert Jan Olsder,et al.  Synchronization and Linearity: An Algebra for Discrete Event Systems , 1994 .

[7]  Isabel Demongodin,et al.  Control of temporal constraints based on dioid algebra for timed event graphs , 2005, 19th IEEE International Parallel and Distributed Processing Symposium.

[8]  Alessandro Giua,et al.  A Survey of Petri Net Methods for Controlled Discrete Event Systems , 1997, Discret. Event Dyn. Syst..

[9]  Carlo Ghezzi,et al.  A Unified High-Level Petri Net Formalism for Time-Critical Systems , 1991, IEEE Trans. Software Eng..