Control and Optimization with Differential-Algebraic Constraints
Published on 15. November 2012
Book
Paperback/Softback
356 pages
978-1-61197-224-5 (ISBN)
Description
Differential-algebraic equations are the most natural way to mathematically model many complex systems in science and engineering. Once the model is derived, it is important to optimize the design parameters and control it in the most robust and efficient way to maximize performance. This book presents the latest theory and numerical methods for the optimal control of differential-algebraic equations. Readers will find the following features presented in a readable fashion so the results are accessible to the widest audience: the most recent theory, written by leading experts from a number of academic and nonacademic areas and departments, several state-of-the-art numerical methods, and real-world applications.
More details
Persons
Lorenz T. Biegler is the Bayer Professor of Chemical Engineering at Carnegie Mellon University and a Fellow of the American Institute of Chemical Engineers.
Content
1. DAEs, control, and optimization
2. Regularization of linear and nonlinear descriptor systems
3. Notes on linearization of DAEs and on optimization with differential-algebraic constraints
4. Spectra and leading directions for linear DAEs
5. StratiGraph tool: matrix stratifications in control applications
6. Descriptor system techniques in solving H_?/?-optimal fault detection and isolation problems
7. Normal forms, high-gain, and funnel control for linear differential-algebraic systems
8. Linear-quadratic optimal control problems with switch points and a small parameter
9. Mixed-integer DAE optimal control problems: necessary conditions and bounds
10. Optimal control of a delay PDE
11. Direct transcription with moving finite elements
12. Solving parameter estimation problems with SOCX
13. Control of integrated chemical process systems using underlying DAE models
14. DMPC for building temperature regulation
15. Dynamic regularization, level set shape optimization, and computed myography
16. The application of Pontryagin's minimum principle for endpoint optimization of batch processes.
2. Regularization of linear and nonlinear descriptor systems
3. Notes on linearization of DAEs and on optimization with differential-algebraic constraints
4. Spectra and leading directions for linear DAEs
5. StratiGraph tool: matrix stratifications in control applications
6. Descriptor system techniques in solving H_?/?-optimal fault detection and isolation problems
7. Normal forms, high-gain, and funnel control for linear differential-algebraic systems
8. Linear-quadratic optimal control problems with switch points and a small parameter
9. Mixed-integer DAE optimal control problems: necessary conditions and bounds
10. Optimal control of a delay PDE
11. Direct transcription with moving finite elements
12. Solving parameter estimation problems with SOCX
13. Control of integrated chemical process systems using underlying DAE models
14. DMPC for building temperature regulation
15. Dynamic regularization, level set shape optimization, and computed myography
16. The application of Pontryagin's minimum principle for endpoint optimization of batch processes.