A Review on Realization Theory for Infinite-Dimensional Systems
Abstract
We give an introduction to the realisation theory for infinite-dimensional systems. That is, we show that for any function G, analytic and bounded in the right half of the complex plane, there exists operators A,B,C such that G(s1)-G(s2) = (s2-s1) C(s1 I-A)-1(s2 I-A)-1B. Here A is the infinitesimal generator of a strongly continuous semigroup on a Hilbert space, and B and C are admissible input and output operators, respectively. Our results summarise and clarify the results as found in the literature, starting more than 40 years ago.
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