000			02034nam a22002897a 4500
001			sulb007419
003			BD-SySUS
005			20221207145045.0
008			221207t20182018enka b 001 0 eng c
020			_a9781108416580 _q(hb)
020			_a1108416586 _q(hb)
040			_aOU/DLC _beng _cOU _erda _dDLC
082	0	0	_a531.01515 _222 _bLEA
100	1		_aLemos, Nivaldo A., _d1952- _eauthor. _958992
240	1	0	_aMec�anica anal�itica. _lEnglish
245	1	0	_aAnalytical mechanics / _cNivaldo A. Lemos, Fluminense Federal University.
250			_aEnglish edition.
264		1	_aCambridge ; _aNew York, NY : _bCambridge University Press, _c2018.
300			_axiii, 459 pages : _billustrations ; _c26 cm
336			_atext _btxt _2rdacontent
337			_aunmediated _bn _2rdamedia
338			_avolume _bnc _2rdacarrier
504			_aIncludes bibliographical references (pages 442-451) and index.
520			_a"Analytical Mechanics is the foundation of many areas of theoretical physics including quantum theory and statistical mechanics, and has wide-ranging applications in engineering and celestial mechanics. This introduction to the basic principles and methods of analytical mechanics covers Lagrangian and Hamiltonian dynamics, rigid bodies, small oscillations, canonical transformations and Hamilton-Jacobi theory. This fully up-to-date textbook includes detailed mathematical appendices and addresses a number of advanced topics, some of them of a geometric or topological character. These include Bertrand's theorem, proof that action is least, spontaneous symmetry breakdown, constrained Hamiltonian systems, non-integrability criteria, KAM theory, classical field theory, Lyapunov functions, geometric phases and Poisson manifolds. Providing worked examples, end-of-chapter problems, and discussion of ongoing research in the field, it is suitable for advanced undergraduate students and graduate students studying analytical mechanics"-- _cProvided by publisher.
650		0	_aMechanics, Analytic.
942			_2ddc _cBK
999			_c82856 _d82856