Abstract
This paper concerns systems of the form $\dot{x}(t) = Ax(t)$, $y(t) = Cx(t)$, where $A$ generates a $C_0$-semigroup. Two conjectures which were posed in 1991 and 1994 are shown not to hold. The first conjecture (by G. Weiss) states that if the range of $C$ is one-dimensional, then $C$ is admissible if and only if a certain resolvent estimate holds. The second conjecture (by D. Russell and G. Weiss) states that a system is exactly observable if and only if a test similar to the Hautus test for finite-dimensional systems holds. The $C_0$-semigroup in both counterexamples is analytic and possesses a basis of eigenfunctions. Using the $(A, C)$-pair from the second counterexample, we construct a generator $A_e$ on a Hilbert space such that $(sI -A_e)$ is uniformly left-invertible, but its semigroup does not have this property.
Original language | English |
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Pages (from-to) | 137-153 |
Number of pages | 17 |
Journal | SIAM journal on control and optimization |
Volume | 43 |
Issue number | 1 |
DOIs | |
Publication status | Published - 2004 |
Keywords
- C-0-semigroup
- Admissible observation operator
- Conditional basis
- Exact observability
- Infinite-dimensional system
- Left-invertibility
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