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Nonlinear systems stability analysis : Lyapunov-based approach / Seyed Kamaleddin Yadavar Nikravesh.

By: Nikravesh, Seyed Kamaleddin Yadavar
Material type: TextTextPublisher: Boca Raton : CRC Press, Taylor & Franic Group, [2013]Edition: 1st edDescription: xi, 307 pages ; 24 cmContent type: text Media type: unmediated Carrier type: volumeISBN: 9781466569287 (hardback)Subject(s): Nonlinear control theory | Lyapunov stability | SCIENCE / Chemistry / Industrial & Technical | TECHNOLOGY & ENGINEERING / Electrical | TECHNOLOGY & ENGINEERING / Quality ControlDDC classification: 515.392 LOC classification: QA402.35 | .N555 2013Other classification: SCI013060 | TEC007000 | TEC032000 Summary: "The dynamic properties of a physical system can be described in terms of ordinary differential, partial differential, difference equations or any combinations of these subjects. In addition, the systems could be time varying, time invariant and/or time delayed, continues or discrete systems. These equations are often nonlinear in one way or the other, and it is rarely possible to find their solutions. Numerical solutions for such nonlinear dynamic systems with the analog or digital computer are impractical. This is due to the fact that a complete solution must be carried out for every possible initial condition in the solution space. Graphical techniques which can be employed for finding the solutions of the special cases of first and second order ordinary systems, are not useful tools for other type of systems as well as higher order ordinary systems"--
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515.392 N.S.N 2013 (Browse shelf) Available 22021

Includes bibliographical references and index.

"The dynamic properties of a physical system can be described in terms of ordinary differential, partial differential, difference equations or any combinations of these subjects. In addition, the systems could be time varying, time invariant and/or time delayed, continues or discrete systems. These equations are often nonlinear in one way or the other, and it is rarely possible to find their solutions. Numerical solutions for such nonlinear dynamic systems with the analog or digital computer are impractical. This is due to the fact that a complete solution must be carried out for every possible initial condition in the solution space. Graphical techniques which can be employed for finding the solutions of the special cases of first and second order ordinary systems, are not useful tools for other type of systems as well as higher order ordinary systems"--

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