Abstract
This paper investigates the differential eigenstructure of Hankel operators for nonlinear systems. First, it is proven that the variational system and the Hamiltonian extension with extended input and output spaces can be interpreted as the Gâteaux differential and its adjoint of a dynamical input-output system, respectively. Second, the Gâteaux differential is utilized to clarify the main result the differential eigenstructure of the nonlinear Hankel operator which is closely related to the Hankel norm of the original system. Third, a new characterization of the nonlinear extension of Hankel singular values are given based on the differential eigenstructure. Finally, a balancing procedure to obtain a new input-normal/output-diagonal realization is derived. The results in this paper thus provide new insights to the realization and balancing theory for nonlinear systems.
| Original language | English |
|---|---|
| Pages (from-to) | 2-18 |
| Number of pages | 17 |
| Journal | IEEE Transactions on Automatic Control |
| Volume | 50 |
| Issue number | 1 |
| DOIs | |
| Publication status | Published - 2005 |
Keywords
- Nonlinear control systems
- Model reduction
- Hankel operators
- Differential eigenstructure
- Balanced realization
- Variational techniques
- Mathematical operators
- Mathematical models
- Hamiltonians
- Eigenvalues and eigenfunctions
- Differential equations
- Nonlinear control
- Model reduction
- Balanced realization