Analysis of Periodic Discrete Event Systems in (Max,+) Algebra

Lahaye, S.; Boimond, J. L.; Hardouin, L.

doi:10.1007/978-1-4615-4493-7_9

S. Lahaye²,
J. L. Boimond² &
L. Hardouin²

Part of the book series: The Springer International Series in Engineering and Computer Science ((SECS,volume 569))

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Abstract

Discrete Event Dynamic Systems modeled by (max,+) linear equations with periodically varying coefficients are studied. It turns out that spectral properties of the so-called monodromy matrix can be used for the performance evaluation of these systems.

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References

F. Baccelli. Ergodic theory of stochastic Petri networks. Annals of Probability, 20(1):375–396, 1992.
Article MathSciNet MATH Google Scholar
F. Baccelli, G. Cohen, G.J. Olsder, and J.P. Quadrat. Synchronization and Linearity. Wiley, 1992.
Google Scholar
S. Bittanti. Deterministic and stochastic linear periodic systems. In Springer, editor, Time series and linear systems, pages 141–182. 1996.
Google Scholar
P. Bolzern, P. Colaneri, and R. Scatolini. Zeros of discrete-time linear periodic systems. IEEE Transactions on Automatic Control, 31:1057–1058, 1986.
Article MATH Google Scholar
G. Cohen, P. Moller, J.P. Quadrat, and M. Viot. Algebraic tools for the performance evaluation of discrete event systems. IEEE Proceedings: Special issue on Discrete Event Systems, 77(1), Jan. 1989.
Google Scholar
P. Colaneri, R. Scatolini, and N. Schiavoni. Stabilization, regulation, and optimization of multirate sampled-data systems. In C.T. Leondes, editor, Control and Dynamic Systems, volume 71, pages 95–130. Academic Press, 1995.
Google Scholar
S. Gaubert. Théorie des systèmes linéaires dans les dioïdes. Thèse, Ecole des Mines de Paris, July 1992.
Google Scholar
E. W. Kamen. Fundamentals of linear time-varying systems. In W. S. Levine, editor, The Control Handbook IEEE Press and CRC Press, 1996.
Google Scholar
S. Laftit, J.M. Proth, and X.L. Xie. Optimization of invariant criteria for event graphs. IEEE Transactions on Automatic Control, 37:547–555, 1992.
Article MathSciNet MATH Google Scholar
S. Lahaye, J.L. Boimond, and L. Hardouin. Just in time control of time-varying discrete event dynamic systems in (max,+) algebra. Internal Report R-99-01, LISA, 1999.
Google Scholar

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Laboratoire d’Ingénierie des Systèmes Automatisés, 62 Avenue Notre-Dame du Lac, 49000, Angers, France
S. Lahaye, J. L. Boimond & L. Hardouin

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S. Lahaye
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J. L. Boimond
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L. Hardouin
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Editors and Affiliations

Ghent University, Belgium
R. Boel & G. Stremersch &

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Lahaye, S., Boimond, J.L., Hardouin, L. (2000). Analysis of Periodic Discrete Event Systems in (Max,+) Algebra. In: Boel, R., Stremersch, G. (eds) Discrete Event Systems. The Springer International Series in Engineering and Computer Science, vol 569. Springer, Boston, MA. https://doi.org/10.1007/978-1-4615-4493-7_9

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DOI: https://doi.org/10.1007/978-1-4615-4493-7_9
Publisher Name: Springer, Boston, MA
Print ISBN: 978-1-4613-7025-3
Online ISBN: 978-1-4615-4493-7
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