Email this article Upper Bounds on Peaks in Discrete-Time Linear Systems
- Authors: Ahiyevich U.M.1, Parsegov S.E.2,3, Shcherbakov P.S.3,4
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Affiliations:
- Moscow Institute of Physics and Technology
- Skolkovo Institute of Science and Technology
- Trapeznikov Institute of Control Sciences
- Institute for Systems Analysis
- Issue: Vol 79, No 11 (2018)
- Pages: 1976-1988
- Section: Linear Systems
- URL: https://journals.rcsi.science/0005-1179/article/view/151065
- DOI: https://doi.org/10.1134/S0005117918110036
- ID: 151065
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Abstract
Trajectories of stable linear systems with nonzero initial conditions are known to deviate considerably from the zero equilibrium point at finite time instances. In the paper we analyze transients in discrete-time linear systems and provide upper bounds on deviations (peaks) via use of linear matrix inequalities. An approach to peak-minimizing feedback design is also proposed. An analysis of peak effects for norms of powers of Schur stable matrices is presented and a robust version of the problem is considered. The theory is illustrated by numerical examples.
About the authors
U. M. Ahiyevich
Moscow Institute of Physics and Technology
Author for correspondence.
Email: sky-mart@hotmail.com
Russian Federation, Dolgoprudnyi
S. E. Parsegov
Skolkovo Institute of Science and Technology; Trapeznikov Institute of Control Sciences
Email: sky-mart@hotmail.com
Russian Federation, Moscow region; Moscow
P. S. Shcherbakov
Trapeznikov Institute of Control Sciences; Institute for Systems Analysis
Email: sky-mart@hotmail.com
Russian Federation, Moscow; Moscow
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