| Lyapunov Matrix Equation in System Stability and Control Contributor(s): Gajic, Zoran (Author), Qureshi, Muhammad Tahir Javed (Author) |
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ISBN: 048646668X ISBN-13: 9780486466682 Publisher: Dover Publications OUR PRICE: $15.26 Product Type: Paperback - Other Formats Published: May 2008 Annotation: This comprehensive treatment provides solutions to many engineering and mathematical problems related to the Lyapunov matrix equation, with self-contained chapters for easy reference. The authors offer a wide variety of techniques for solving and analyzing the algebraic, differential, and difference Lyapunov matrix equations of continuous-time and discrete-time systems. 1995 edition. |
| Additional Information |
| BISAC Categories: - Mathematics | Applied - Science | Chaotic Behavior In Systems - Mathematics | Algebra - Linear |
| Dewey: 003.85 |
| LCCN: 2007049458 |
| Series: Dover Books on Engineering |
| Physical Information: 0.54" H x 5.55" W x 8.45" (0.62 lbs) 272 pages |
| Descriptions, Reviews, Etc. |
| Publisher Description: This book provides solutions to many engineering and mathematical problems related to the Lyapunov matrix equation. Geared toward an audience of engineers, applied mathematicians, computer scientists, and graduate students, it explores issues of mathematical development and applications, making it equally practical for problem solving and research. Its comprehensive treatment features self-contained chapters for quick and precise reference. The authors offer a wide variety of techniques for solving and analyzing the algebraic, differential, and difference Lyapunov matrix equations of continuous-time and discrete-time systems. The matrix equations are considered in terms of three main categories: explicit solutions; approximate solutions characterized by different bounds, such as eigenvalue bounds, trace bounds, determinant bounds, and solution bounds; and numerical solutions suitable for computer calculations. Numerous examples of real-world systems appear throughout, illustrating the effectiveness of cited methods and algorithms. |
