Siberian Mathematical Journal

, Volume 24, Issue 2, pp 279–287 | Cite as

Controllability of systems described by partial differential equations

  • S. N. Samborskii


Differential Equation Partial Differential Equation 
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Literature Cited

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    H. J. Sussman and V. Jurdjevic, “Controllability of nonlinear systems,” J. Diff. Eqns.,12, 95–116 (1979).Google Scholar
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    A. J. Krener, “A generalization of Chow's theorem and the bang-bang theorem to nonlinear control problems,” SIAM J. Control Optimiz.,12, No. 1, 43–52 (1974).Google Scholar
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    R. W. Brockett, “Nonlinear systems and differential geometry,” Proc. IEEE,64, No. 1, 60–88 (1967).Google Scholar
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    R. Triggiani, “Extension of rank condition for controllability and observability of Banach spaces and unbounded operators,” SIAM J. Control Optimiz.,14, No. 2, 313–338 (1976).Google Scholar
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    P. I. Dudnikov and S. N. Samborskii, “A controllability criterion for systems in a Banach space. A generalization of Chow's theorem,” Ukr. Mat. Zh.,32, No. 5, 649–653 (1980).Google Scholar

Copyright information

© Plenum Publishing Corporation 1983

Authors and Affiliations

  • S. N. Samborskii

There are no affiliations available

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