000			02220nam a22003618i 4500
001			CR9781108235013
003			UkCbUP
005			20200124160337.0
006			m|||||o||d||||||||
007			cr||||||||||||
008			161205s2017||||enk o ||1 0|eng|d
020			_a9781108235013 (ebook)
020			_z9781108415705 (hardback)
040			_aUkCbUP _beng _erda _cUkCbUP
050	0	0	_aQC20.7.F56 _bG36 2017
082	0	0	_a518/.25 _223
100	1		_aGanesan, Sashikumaar, _eauthor.
245	1	0	_aFinite elements : _btheory and algorithms / _cSashikumaar Ganesan, Lutz Tobiska.
264		1	_aCambridge : _bCambridge University Press, _c2017.
300			_a1 online resource (vi, 208 pages) : _bdigital, PDF file(s).
336			_atext _btxt _2rdacontent
337			_acomputer _bc _2rdamedia
338			_aonline resource _bcr _2rdacarrier
490	1		_aCambridge--IISc series
500			_aTitle from publisher's bibliographic system (viewed on 05 Jan 2018).
520			_aWritten in easy to understand language, this self-explanatory guide introduces the fundamentals of finite element methods and its application to differential equations. Beginning with a brief introduction to Sobolev spaces and elliptic scalar problems, the text progresses through an explanation of finite element spaces and estimates for the interpolation error. The concepts of finite element methods for parabolic scalar parabolic problems, object-oriented finite element algorithms, efficient implementation techniques, and high dimensional parabolic problems are presented in different chapters. Recent advances in finite element methods, including non-conforming finite elements for boundary value problems of higher order and approaches for solving differential equations in high dimensional domains are explained for the benefit of the reader. Numerous solved examples and mathematical theorems are interspersed throughout the text for enhanced learning.
650		0	_aFinite element method.
650		0	_aDifferential equations, Partial.
700	1		_aTobiska, L. _q(Lutz), _d1950- _eauthor.
776	0	8	_iPrint version: _z9781108415705
830		0	_aCambridge - IISc Series.
856	4	0	_uhttps://doi.org/10.1017/9781108235013
999			_c523160 _d523158