| 000 | 07120cam a2200601Ki 4500 | ||
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| 001 | 9781315168265 | ||
| 003 | FlBoTFG | ||
| 005 | 20220509193140.0 | ||
| 006 | m o d | ||
| 007 | cr cnu---unuuu | ||
| 008 | 190711s2019 flu ob 001 0 eng d | ||
| 040 |
_aOCoLC-P _beng _erda _epn _cOCoLC-P |
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| 020 |
_a9781315168265 _q(electronic bk.) |
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_a131516826X _q(electronic bk.) |
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| 020 |
_a9780429679247 _q(electronic bk. : Mobipocket) |
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_a0429679246 _q(electronic bk. : Mobipocket) |
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_a0429679416 _q(electronic bk. : EPUB) |
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_a9781351685443 _q(electronic bk. : PDF) |
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_a1351685449 _q(electronic bk. : PDF) |
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| 020 |
_a9780429679414 _q(electronic bk.) |
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| 020 | _z9781138051584 | ||
| 020 | _z1138051586 | ||
| 024 | 8 |
_a10.1201/9781315168265 _2doi |
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| 035 | _a(OCoLC)1107880840 | ||
| 035 | _a(OCoLC-P)1107880840 | ||
| 050 | 4 |
_aQC20.7.F56 _bK85 2019eb |
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| 072 | 7 |
_aMAT _x000000 _2bisacsh |
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| 072 | 7 |
_aMAT _x003000 _2bisacsh |
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| 072 | 7 |
_aMAT _x021000 _2bisacsh |
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| 072 | 7 |
_aUB _2bicssc |
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| 082 | 0 | 4 |
_a530.15/1825 _223 |
| 100 | 1 |
_aKumar, Sandeep _c(Professor of mechanical engineering), _eauthor. |
|
| 245 | 1 | 0 |
_aMathematical theory of subdivision : _bfinite element and wavelet methods / _cSandeep Kumar, Ashish Pathak, Debasish Khan. |
| 264 | 1 |
_aBoca Raton, Florida : _bCRC Press, _c[2019] |
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| 300 | _a1 online resource. | ||
| 336 |
_atext _btxt _2rdacontent |
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| 337 |
_acomputer _bc _2rdamedia |
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| 338 |
_aonline resource _bcr _2rdacarrier |
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| 520 | _aThis book provides good coverage of the powerful numerical techniques namely, finite element and wavelets, for the solution of partial differential equation to the scientists and engineers with a modest mathematical background. The objective of the book is to provide the necessary mathematical foundation for the advanced level applications of these numerical techniques. The book begins with the description of the steps involved in finite element and wavelets-Galerkin methods. The knowledge of Hilbert and Sobolev spaces is needed to understand the theory of finite element and wavelet-based methods. Therefore, an overview of essential content such as vector spaces, norm, inner product, linear operators, spectral theory, dual space, and distribution theory, etc. with relevant theorems are presented in a coherent and accessible manner. For the graduate students and researchers with diverse educational background, the authors have focused on the applications of numerical techniques which are developed in the last few decades. This includes the wavelet-Galerkin method, lifting scheme, and error estimation technique, etc. Features: Computer programs in Mathematica/Matlab are incorporated for easy understanding of wavelets. Presents a range of workout examples for better comprehension of spaces and operators. Algorithms are presented to facilitate computer programming. Contains the error estimation techniques necessary for adaptive finite element method. This book is structured to transform in step by step manner the students without any knowledge of finite element, wavelet and functional analysis to the students of strong theoretical understanding who will be ready to take many challenging research problems in this area. | ||
| 505 | 0 | _a<P>Preface</P><P>About the authors</P><OL><B><P></P></OL><P>1. Overview of finite element method</P><OL><P></P><OL></B><P><LI>Some common governing differential equations </LI><P></P><P><LI>Basic steps of finite element method </LI><P></P><P><LI>Element stiffness matrix for a bar </LI><P></P><P><LI>Element stiffness matrix for single variable 2d element </LI><P></P><P><LI>Element stiffness matrix for a beam element</LI><P></P><P><LI>References for further reading</LI><P></P></OL></OL><OL><B><P></P></OL><P>2. Wavelets</P><OL><P></P></OL><OL><OL></B><P><LI>Wavelet basis functions</LI><P></P><P><LI>Wavelet-Galerkin method </LI><P></P><P><LI>Daubechies wavelets for boundary and initial value problems </LI><P></P><P><LI>References for further reading</LI><P></P></OL></OL><OL><B><P></P></OL><P>3. Fundamentals of vector spaces </P><OL><P></P></OL><OL><OL></B><P><LI>Introduction</LI><P></P><P><LI>Vector spaces </LI><P></P><P><LI>Normed linear spaces </LI><P></P><P><LI>Inner product spaces </LI><P></P><P><LI>Banach spaces </LI><P></P><P><LI>Hilbert spaces </LI><P></P><P><LI>Projection on finite dimensional spaces</LI><P></P><P><LI>Change of basis -- Gram-Schmidt othogonalization process</LI><P></P><P><LI>Riesz bases and frame conditions</LI><P></P><P><LI>References for further reading</LI><P></P></OL></OL><OL><B><P></P></OL><P>4. Operators</P><OL><P></P></OL><OL><OL></B><P><LI>Mapping of sets, general concept of functions</LI><P></P><P><LI>Operators</LI><P></P><P><LI>Linear and adjoint operators</LI><P></P><P><LI>Functionals and dual space</LI><P></P><P><LI>Spectrum of bounded linear self-adjoint operator </LI><P></P><P><LI>Classification of differential operators</LI><P></P><P><LI>Existence, uniqueness and regularity of solution</LI><P></P><P><LI>References</LI><P></P></OL></OL><OL><B><P></P></OL><P>5. Theoretical foundations of the finite element method</B> </P><OL><P></P></OL><OL><OL><P><LI>Distribution theory</LI><P></P><P><LI>Sobolev spaces</LI><P></P><P><LI>Variational Method</LI><P></P><P><LI>Nonconforming elements and patch test</LI><P></P><P><LI>References for further reading</LI><P></P></OL></OL><OL><B><P></P></OL><P>6. Wavelet- based methods for differential equations</P><OL><P></P></OL><OL><OL></B><P><LI>Fundamentals of continuous and discrete wavelets</LI><P></P><P><LI>Multiscaling</LI><P></P><P><LI>Classification of wavelet basis functions </LI><P></P><P><LI>Discrete wavelet transform </LI><P></P><P><LI>Lifting scheme for discrete wavelet transform </LI><P></P><P><LI>Lifting scheme to customize wavelets </LI><P></P><P><LI>Non-standard form of matrix and its solution </LI><P></P><P><LI>Multigrid method</LI><P></P><P><LI>References for further reading</LI><P></P></OL></OL><OL><B><P></P></OL><P>7. Error -- estimation</B></P><OL><P></P><OL><P><LI>Introduction</LI><P></P><I><P><LI>A-priori</I> error estimation</LI><P></P><P><LI>Recovery based error estimators </LI><P></P><P><LI>Residual based error estimators </LI><P></P><P><LI>Goal oriented error estimators</LI><P></P><P><LI>Hierarchical & wavelet based error estimator</LI><P></P><P><LI>References for further reading</LI><P></P></OL></OL><B><P>Appendix</B><I><I></P></I></I> | |
| 588 | _aOCLC-licensed vendor bibliographic record. | ||
| 650 | 0 | _aFinite element method. | |
| 650 | 0 | _aWavelets (Mathematics) | |
| 650 | 0 | _aNumerical analysis. | |
| 650 | 0 | _aHarmonic analysis. | |
| 650 | 0 | _aGeneralized spaces. | |
| 650 | 7 |
_aMATHEMATICS / General _2bisacsh |
|
| 650 | 7 |
_aMATHEMATICS / Applied _2bisacsh |
|
| 650 | 7 |
_aMATHEMATICS / Number Systems _2bisacsh |
|
| 700 | 1 |
_aPathak, Ashish, _eauthor. |
|
| 700 | 1 |
_aKhan, Debasish, _eauthor. |
|
| 856 | 4 | 0 |
_3Taylor & Francis _uhttps://www.taylorfrancis.com/books/9781315168265 |
| 856 | 4 | 2 |
_3OCLC metadata license agreement _uhttp://www.oclc.org/content/dam/oclc/forms/terms/vbrl-201703.pdf |
| 999 |
_c130902 _d130902 |
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