Abstract
Nonlinear negative imaginary systems find application in a range of engineering fields, including the control of flexible structures and air vehicles. Nevertheless, unlike their linear counterparts, the theory for nonlinear negative imaginary systems is not as well-established. In this paper, we propose a generalized k-th order dissipativity framework with respect to a supply rate which is a function of the k-th time-derivative of the system output. It is shown that positive
realness and negative imaginaryness can be defined in this general framework in a unified manner. Then, necessary and sufficient conditions for first order dissipativity of nonlinear systems are obtained. These capture and are more general than the negative imaginary property. Moreover, the concept of
exponentially negative imaginary systems for both linear and nonlinear systems is developed and the required conditions are obtained.
realness and negative imaginaryness can be defined in this general framework in a unified manner. Then, necessary and sufficient conditions for first order dissipativity of nonlinear systems are obtained. These capture and are more general than the negative imaginary property. Moreover, the concept of
exponentially negative imaginary systems for both linear and nonlinear systems is developed and the required conditions are obtained.
| Original language | English |
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| Title of host publication | Proceedings of the 14th UKACC International Conference on Control, Winchester, UK, Apr 2024 |
| DOIs | |
| Publication status | Published - 22 May 2024 |
Keywords
- Negative Imaginary Systems
- Dissipative Systems
- Passive Systems
- Nonlinear Systems