${L}^{\infty}$-norm computation for linear time-invariant systems depending on parameters
Abstract
This paper focuses on representing the -norm of finite-dimensional linear time-invariant systems with parameter-dependent coefficients. Previous studies tackled the problem in a non-parametric scenario by simplifying it to finding the maximum -projection of real solutions of a system of the form , where . To solve this problem, standard computer algebra methods were employed and analyzed \cite{bouzidi2021computation}. In this paper, we extend our approach to address the parametric case. We aim to represent the "maximal" -projection of real solutions of as a function of the given parameters. %a set of parameters . To accomplish this, we utilize cylindrical algebraic decomposition. This method allows us to determine the desired value as a function of the parameters within specific regions of parameter space.
Cite
@article{arxiv.2312.00760,
title = {${L}^{\infty}$-norm computation for linear time-invariant systems depending on parameters},
author = {Alban Quadrat and Fabrice Rouillier and Grace Younes},
journal= {arXiv preprint arXiv:2312.00760},
year = {2023}
}