Citation
Michael Margaliot. "Stability Analysis of Switched Systems using Variational Principles". Talk or presentation, 5, August, 2008.

Abstract
Switched systems-systems that can switch between several different modes of operation-are ubiquitous in the world around us. Mathematical models that incorporate switching between several subsystems have numerous applications in many disciplines of science. We consider the stability analysis of switched systems under arbitrary switching. A promising approach for addressing this problem is based on characterizing the "most unstable" switching law. This can be done using variational principles. We also describe how the variational approach can be merged with another approach for analyzing switched systems that is based on Lie-algebraic considerations.

Electronic downloads

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• HTML

  Michael Margaliot. <a
  href="http://chess.eecs.berkeley.edu/pubs/480.html"><i>Stability
  Analysis of Switched Systems using Variational
  Principles</i></a>, Talk or presentation,  5,
  August, 2008.

• Plain text

  Michael Margaliot. "Stability Analysis of Switched Systems
  using Variational Principles". Talk or presentation,  5,
  August, 2008.

• BibTeX

  @presentation{Margaliot08_StabilityAnalysisOfSwitchedSystemsUsingVariationalPrinciples,
      author = {Michael Margaliot},
      title = {Stability Analysis of Switched Systems using
                Variational Principles},
      day = {5},
      month = {August},
      year = {2008},
      abstract = {Switched systems-systems that can switch between
                several different modes of operation-are
                ubiquitous in the world around us. Mathematical
                models that incorporate switching between several
                subsystems have numerous applications in many
                disciplines of science. We consider the stability
                analysis of switched systems under arbitrary
                switching. A promising approach for addressing
                this problem is based on characterizing the "most
                unstable" switching law. This can be done using
                variational principles. We also describe how the
                variational approach can be merged with another
                approach for analyzing switched systems that is
                based on Lie-algebraic considerations. },
      URL = {http://chess.eecs.berkeley.edu/pubs/480.html}
  }
  

Posted by Hiren D. Patel on 6 Aug 2008.
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