000			02227nam a2200349Ia 4500
001			CRC0KE21248PDF
003			FlBoTFG
005			20230512174317.0
006			m o d
007			cr cn
008			130305s2013 fluad ob 001 0 eng d
020			_a9781315215990
035			_a(OCoLC)825767978
040			_aFlBoTFG _cFlBoTFG
082			_a515.392 _bN694
090			_aQA402.35 _b.N555 2013
100	1		_aNikravesh, Seyed Kamaleddin Yadavar.
245	1	0	_aNonlinear Systems Stability Analysis : _bLyapunov-Based Approach /
260			_aBoca Raton : _bCRC Press, _cc2013.
300			_a319 p. : _b40 B/W Ill.
504			_aIncludes bibliographical references and index.
505	0		_ach. 1. Basic concepts -- ch. 2. Stability analysis of autonomous systems -- ch. 3. Stability analysis of nonautonomous systems -- ch. 4. Stability analysis of time-delayed systems -- ch. 5. An introduction to stability analysis of linguistic fuzzy dynamic systems.
520			_aThe 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-- _cProvided by publisher.
530			_aAlso available in print edition.
538			_aMode of access: World Wide Web.
650		0	_aNonlinear control theory.
650		0	_aLyapunov stability.
655		7	_aElectronic books. _2lcsh
776	1		_z9781466569287 (hardback)
856	4	0	_uhttp://marc.crcnetbase.com/isbn/9781466569294 _qebook
942			_2ddc _cEBK
999			_c1033 _d1033