Functional Viability

  • Jean-Pierre Aubin
Part of the Systems & Control: Foundations & Applications book series (MBC)


Differential equations and inclusions describe the evolution of systems where, at each instant, the velocity of the state depends upon the value of the state at this very instant (in a single or multivalued way).


Closed Subset Differential Inclusion Viability Kernel Compact Image Stability Assumption 
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  1. [264]
    HADDAD G. (1981) Monotone trajectories of differential inclusions with memory, Isr. J. Math., 39, 83–100CrossRefMATHGoogle Scholar
  2. [265]
    HADDAD G. (1981) Monotone viable trajectories for functional differential inclusions, J. Diff. Eq., 42, 1–24CrossRefMATHGoogle Scholar
  3. [267]
    HADDAD G. (1981)Google Scholar
  4. [223]
    DULUC R. Si VIGNERON C. (1990) Linear functional viability constraints, Proceedings of the 9th International Conference on Analysis and Optimization of Systems, Nice, June 1990, Lecture Notes in Control and Information Sciences, Springer-VerlagGoogle Scholar

Copyright information

© Springer Science+Business Media New York 2009

Authors and Affiliations

  • Jean-Pierre Aubin
    • 1
  1. 1.EDOMADE (Ecole Doctorale de Mathématique de la Décision)Université de Paris-DauphineParis cedex 16France

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