Gain and phase type multipliers for structured feedback robustness
Preprint, 2022

It is known that the stability of a feedback interconnection of two linear time-invariant systems implies that the graphs of the open-loop systems are quadratically separated. This separation is defined by an object known as the multiplier. The theory of integral quadratic constraints shows that the converse also holds under certain conditions. This paper establishes that if the feedback is robustly stable against certain structured uncertainty, then there always exists a multiplier that takes a corresponding form. In particular, if the feedback is robustly stable to certain gain-type uncertainty, then there exists a corresponding multiplier that is of phase-type, i.e., its diagonal blocks are zeros. These results build on the notion of phases of matrices and systems, which was recently introduced in the field of control. Similarly, if the feedback is robustly stable to certain phase-type uncertainty, then there exists a gain-type multiplier, i.e., its off-diagonal blocks are zeros. The results are meaningfully instructive in the search for a valid multiplier for establishing robust closed-loop stability, and cover the well-known small-gain and the recent small-phase theorems.

Author

Axel Ringh

Chalmers, Mathematical Sciences, Applied Mathematics and Statistics

Xin Mao

Hong Kong University of Science and Technology

Wei Chen

Peking University

Li Qiu

Hong Kong University of Science and Technology

Sei Zhen Khong

Independent researcher

Subject Categories

Computational Mathematics

Control Engineering

Mathematical Analysis

Roots

Basic sciences

DOI

10.48550/arXiv.2203.11837

More information

Latest update

10/25/2023