On stability of switched linear hyperbolic conservation laws with reflecting boundaries

On stability of switched linear hyperbolic conservation laws with reflecting boundaries
Saurabh Amin, Falk Hante, Alexandre Bayen

Citation
Saurabh Amin, Falk Hante, Alexandre Bayen. "On stability of switched linear hyperbolic conservation laws with reflecting boundaries". Magnus Egerstedt and Bud Mishra, (eds.), 602-605, Hybrid Systems: Comp, Springer-Verlag, 2008.

Abstract
We consider stability of an infinite dimensional switching system, posed as a system of linear hyperbolic partial differential equations (PDEs) with reflecting boundaries, where the system parameters and the boundary conditions switch in time. Asymptotic stability of the solution for arbitrary switching is proved under commutativity of the advective velocity matrices and a joint spectral radius condition involving the boundary data.

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HTML

Saurabh Amin, Falk Hante, Alexandre Bayen. <a
href="http://chess.eecs.berkeley.edu/pubs/453.html"
><i>On stability of switched linear hyperbolic
conservation laws with reflecting
boundaries</i></a>, Magnus Egerstedt and Bud
Mishra, (eds.), 602-605, Hybrid Systems: Comp,
Springer-Verlag, 2008.

Plain text

Saurabh Amin, Falk Hante, Alexandre Bayen. "On
stability of switched linear hyperbolic conservation laws
with reflecting boundaries". Magnus Egerstedt and Bud
Mishra, (eds.), 602-605, Hybrid Systems: Comp,
Springer-Verlag, 2008.

BibTeX

@inbook{AminHanteBayen08_OnStabilityOfSwitchedLinearHyperbolicConservationLaws,
    author = {Saurabh Amin and Falk Hante and Alexandre Bayen},
    editor = {Magnus Egerstedt and Bud Mishra,},
    title = {On stability of switched linear hyperbolic
              conservation laws with reflecting boundaries},
    pages = {602-605},
    edition = {Hybrid Systems: Comp},
    publisher = {Springer-Verlag},
    year = {2008},
    abstract = {We consider stability of an infinite dimensional
              switching system, posed as a system of linear
              hyperbolic partial differential equations (PDEs)
              with reflecting boundaries, where the system
              parameters and the boundary conditions switch in
              time. Asymptotic stability of the solution for
              arbitrary switching is proved under commutativity
              of the advective velocity matrices and a joint
              spectral radius condition involving the boundary
              data.},
    URL = {http://chess.eecs.berkeley.edu/pubs/453.html}
}

Posted by Saurabh Amin on 23 Jun 2008.
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