Computing H-infinity Norms of Time-Delay Systems
Abstract
In this paper we consider the computation of H-infinity norm of retarded time-delay systems with discrete pointwise state delays. It is well known that in the finite dimensional case H-infinity norm of a system is computed using the connection between the singular values of the transfer function and the imaginary axis eigenvalues of an Hamiltonian matrix. We show a similar connection between the singular values of a transfer function of a time-delay system and the imaginary axis eigenvalues of an infinite dimensional operator . Using spectral methods, this linear operator is approximated with a matrix. The approximate H-infinity norm of the time-delay system is calculated using the connection between the imaginary eigenvalues of this matrix and the singular values of a finite dimensional approximation of the time-delay system. Finally the approximate results are corrected by solving a set of equations which are obtained from the reformulation of the eigenvalue problem for as a finite dimensional nonlinear eigenvalue problem.
Cite
@article{arxiv.2003.03248,
title = {Computing H-infinity Norms of Time-Delay Systems},
author = {Suat Gumussoy and Wim Michiels},
journal= {arXiv preprint arXiv:2003.03248},
year = {2020}
}