<div class="csl-bib-body">
<div class="csl-entry">Achleitner, F., Arnold, A., Carlen, E., Jüngel, A., & Mehrmann, V. (2023, September 18). <i>The Hypocoercivity Index for the short time behavior of linear time-invariant ODE systems</i> [Conference Presentation]. ÖMG Tagung 2023 Meeting of the Austrian Mathematical Society, Karl-Franzens-University (KFU), Graz, Austria.</div>
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dc.identifier.uri
http://hdl.handle.net/20.500.12708/188527
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dc.description.abstract
We consider the class of conservative-dissipative ODE systems, which is a subclass of Lyapunov stable, linear time-invariant ODE systems. We characterize asymptotically stable, conservative-dissipative ODE systems via the hypocoercivity (theory) of their system matrices. Our main result is a concise characterization of the hypocoercivity index (an algebraic structural property of matrices with positive semi-definite Hermitian part introduced in Achleitner, Arnold, and Carlen (2018)) in terms of the short time behavior of the norm of the matrix exponential for the associated conservative-dissipative ODE system.
[1] F. Achleitner, A. Arnold, and E.A. Carlen, On multi-dimensional hypocoercive BGK models, Kinet. Relat. Models 11 (2018), no. 4, 953-1009.
[2] F. Achleitner, A. Arnold, and E.A. Carlen, The hypocoercivity index for the short time behavior of linear time-invariant ODE systems. Journal of Differential Equations 371 (2023), 83-115.
en
dc.language.iso
en
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dc.subject
semi-dissipative ODE systems
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dc.subject
hypocoercivity (index)
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dc.title
The Hypocoercivity Index for the short time behavior of linear time-invariant ODE systems