Abstract:
A necessary condition for feedback stabilizability of a linear system with a controller of fixed order is proposed. The condition is useful for designing low-order regula...Show MoreMetadata
Abstract:
A necessary condition for feedback stabilizability of a linear system with a controller of fixed order is proposed. The condition is useful for designing low-order regulators and can be easily calculated in the case of single-input or single-output systems by solving a standard linear-programming problem.<>
Published in: IEEE Transactions on Automatic Control ( Volume: 33, Issue: 5, May 1988)
DOI: 10.1109/9.1226
Keywords assist with retrieval of results and provide a means to discovering other relevant content. Learn more.
- IEEE Keywords
- Index Terms
- Linear Programming ,
- Stabilisability Conditions ,
- Step Function ,
- Absolutely Continuous ,
- Decomposition Theorem ,
- Optimal Conditions ,
- Transfer Function ,
- Closed-loop System ,
- Ill-conditioned ,
- Plant Parameters ,
- KKT Conditions ,
- Characteristic Polynomial ,
- Linear Quadratic Regulator ,
- Optimal Gain ,
- Optimal Feedback ,
- Singular Perturbation ,
- Linear Quadratic
Keywords assist with retrieval of results and provide a means to discovering other relevant content. Learn more.
- IEEE Keywords
- Index Terms
- Linear Programming ,
- Stabilisability Conditions ,
- Step Function ,
- Absolutely Continuous ,
- Decomposition Theorem ,
- Optimal Conditions ,
- Transfer Function ,
- Closed-loop System ,
- Ill-conditioned ,
- Plant Parameters ,
- KKT Conditions ,
- Characteristic Polynomial ,
- Linear Quadratic Regulator ,
- Optimal Gain ,
- Optimal Feedback ,
- Singular Perturbation ,
- Linear Quadratic
