1.9 KiB
1.9 KiB
Table of Contents for 3 Notes
Files
- Feedback Control Theory.md
- How is robust control validation done?.md
- Robust Control.md
- What is gain scheduling?.md
Summary
This is a comprehensive set of notes on Feedback Control Theory, covering various topics such as sensitivity and complementary sensitivity functions, robustness and stability, and uncertainty and perturbation. Here's a brief summary of the key points:
Sensitivity and Complementary Sensitivity Functions
- The sensitivity function S is defined as 1/(1+L), where L is the loop gain.
- The complementary sensitivity function T is defined as L/(1+L).
- These functions are used to analyze the performance of a feedback system.
Robustness and Stability
- A controller C is robust to a set of plants
\mathcal{P}with respect to a characteristic if this characteristic holds for every plant in\mathcal{P}. - A system is robustly stable if it is internally stable for every plant in the set
\mathcal{P}:|| \Delta W_2 T ||_\infty < 1. - Nominal performance is achieved simultaneously when
|| \text{max} (|W_1S|, |W_2 T|)||_\infty < 1.
Uncertainty and Perturbation
- The multiplicative disk perturbation is defined as
\tilde P = (1+\Delta W_2)P, where P is a nominal plant transfer function. ||\Delta||_\infty <1ensures that the system remains stable for all plants in the set\mathcal{P}.
Key Concepts
- Robustness: the distance between L and -1 for all frequencies, which determines how much room there is for plant perturbation before becoming unstable.
- Uncertainty profile:
|W_2(j\omega)|describes a disk in the complex plane that indicates the maximum amount of uncertainty allowed.
Overall, these notes provide a solid foundation for understanding the concepts and techniques used in feedback control theory, particularly in the context of robustness and stability analysis.
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