000			02245nam a22003978a 4500
001			CR9780511662829
003			UkCbUP
005			20160624102258.0
006			m|||||o||d||||||||
007			cr||||||||||||
008			091215s1996||||enk s ||1 0|eng|d
020			_a9780511662829 (ebook)
020			_z9780521579001 (paperback)
040			_aUkCbUP _cUkCbUP _erda
050	0	0	_aQA274.25 _b.D38 1996
082	0	0	_a519.2 _220
100	1		_aDa Prato, G., _eauthor.
245	1	0	_aErgodicity for Infinite Dimensional Systems / _cG. Da Prato, J. Zabczyk.
260		1	_aCambridge : _bCambridge University Press, _c1996.
264		1	_aCambridge : _bCambridge University Press, _c1996.
300			_a1 online resource (352 pages) : _bdigital, PDF file(s).
336			_atext _btxt _2rdacontent
337			_acomputer _bc _2rdamedia
338			_aonline resource _bcr _2rdacarrier
490	0		_aLondon Mathematical Society Lecture Note Series ; _vno. 229
500			_aTitle from publisher's bibliographic system (viewed on 16 Oct 2015).
520			_aThis book is devoted to the asymptotic properties of solutions of stochastic evolution equations in infinite dimensional spaces. It is divided into three parts: Markovian dynamical systems; invariant measures for stochastic evolution equations; invariant measures for specific models. The focus is on models of dynamical processes affected by white noise, which are described by partial differential equations such as the reaction-diffusion equations or Navier–Stokes equations. Besides existence and uniqueness questions, special attention is paid to the asymptotic behaviour of the solutions, to invariant measures and ergodicity. Some of the results found here are presented for the first time. For all whose research interests involve stochastic modelling, dynamical systems, or ergodic theory, this book will be an essential purchase.
650		0	_aDifferentiable dynamical systems
650		0	_aErgodic theory
700	1		_aZabczyk, J., _eauthor.
776	0	8	_iPrint version: _z9780521579001
786			_dCambridge
830		0	_aLondon Mathematical Society Lecture Note Series ; _vno. 229.
856	4	0	_uhttp://dx.doi.org/10.1017/CBO9780511662829
942			_2EBK12070 _cEBK
999			_c41364 _d41364