Abstract
In this letter we investigate a class of slow-fast systems for which the classical model order reduction technique based on singular perturbations does not apply due to the lack of a Normally Hyperbolic critical manifold. We show, however, that there exists a class of slow-fast systems that after a well-defined change of coordinates have a Normally Hyperbolic critical manifold. This allows the use of model order reduction techniques and to qualitatively describe the dynamics from auxiliary reduced models even in the neighborhood of a non-hyperbolic point. As an important consequence of the model order reduction step, we show that it is possible to design composite controllers that stabilize the (non-hyperbolic) origin.
| Original language | English |
|---|---|
| Pages (from-to) | 68-73 |
| Journal | IEEE Control Systems Letters |
| Volume | 1 |
| Issue number | 1 |
| Early online date | 11-May-2017 |
| DOIs | |
| Publication status | Published - Jul-2017 |
| Event | 56th IEEE Conference on Decision and Control - Melbourne, Australia Duration: 12-Dec-2017 → 15-Dec-2017 |
Keywords
- Model order reduction
- Perturbation methods
- Nonlinear control systems