English

Admissible operators and ${\mathcal H}_{\infty}$ calculus

Functional Analysis 2011-09-08 v2

Abstract

Given a Hilbert space and the generator AA of a strongly continuous, exponentially stable, semigroup on this Hilbert space. For any g(s)Hg(-s) \in {\mathcal H}_{\infty} we show that there exists an infinite-time admissible output operator g(A)g(A). If gg is rational, then this operator is bounded, and equals the "normal" definition of g(A)g(A). In particular, when g(s)=1/(s+α)g(s)=1/(s + \alpha), αC0+ \alpha \in {\mathbb C}_0^+, then this admissible output operator equals (αIA)1(\alpha I - A)^{-1}. Although in general g(A)g(A) may be unbounded, we always have that g(A)g(A) multiplied by the semigroup is a bounded operator for every (strictly) positive time instant. Furthermore, when there exists an admissible output operator CC such that (C,A)(C,A) is exactly observable, then g(A)g(A) is bounded for all gg's with g(s)Hg(-s) \in {\mathcal H}_{\infty}, i.e., there exists a bounded H{\mathcal H}_{\infty}-calculus. Moreover, we rediscover some well-known classes of generators also having a bounded H{\mathcal H}_{\infty}-calculus.

Keywords

Cite

@article{arxiv.1001.3482,
  title  = {Admissible operators and ${\mathcal H}_{\infty}$ calculus},
  author = {Hans Zwart},
  journal= {arXiv preprint arXiv:1001.3482},
  year   = {2011}
}

Comments

19 pages

R2 v1 2026-06-21T14:36:57.931Z