Sciweavers

SCL
2008

Nuclearity of Hankel operators for ultradifferentiable control systems

14 years 11 days ago
Nuclearity of Hankel operators for ultradifferentiable control systems
Nuclearity of the Hankel operator is a known sufficient condition for convergence of Lyapunov-balanced truncations. We show how a previous result on nuclearity of Hankel operators of systems with an analytic semigroup can be extended to systems with a semigroup of class Dp with p 1 (the case p = 1 being the analytic case). For semigroups that are generated by a Dunford-Schwartz spectral operator we prove that being of class Dp is equivalent to being (Gevrey) ultradifferentiable of order p. We illustrate how for certain partial differential equations our results lead to an easy way of showing nuclearity of the Hankel operator for a wide range of control and observation operators by considering several examples of damped beams.
Mark R. Opmeer
Added 14 Dec 2010
Updated 14 Dec 2010
Type Journal
Year 2008
Where SCL
Authors Mark R. Opmeer
Comments (0)