El Alaoui, F.-Z. and Zwart, H. and Boutoulout, A. (2011) Spectral conditions implied by observability. SIAM Journal on Control and Optimization, 49 (2). pp. 672-685.

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It is well known that a finite-dimensional output space implies limitations on the systems properties, like observability and detectability. In this paper we extend this result for infinitedimensional output spaces, under the condition that the output operator is relatively compact. We show that if this holds, and the system is exactly observable in finite-time, then the inverse of the infinitesimal generator must be compact. By means of an example we show that this result does not hold for exact observability in infinite-time. Using the Hautus test, we obtain spectral properties of the generator for this case. A consequence of this result is that if the system is exponentially detectable, then the unstable part of the spectrum consists of only point spectrum with finite multiplicity. © 2011 Society for Industrial and Applied Mathematics.

Item Type: Article
Uncontrolled Keywords: Detectability; Exact observability; Finite multiplicity; Hautus test; Infinitesimal generator; Relative compact output operator; Spectral conditions; Spectral properties; Stabilizability, Observability
Subjects: Mathematics
Divisions: SCIENTIFIC PRODUCTION > Mathematics
Depositing User: Administrateur Eprints Administrateur Eprints
Last Modified: 31 Jan 2020 15:48
URI: http://eprints.umi.ac.ma/id/eprint/4136

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