| 000 | a | ||
|---|---|---|---|
| 999 |
_c33334 _d33334 |
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| 008 | 241118b xxu||||| |||| 00| 0 eng d | ||
| 020 | _a9780387313122 | ||
| 082 |
_a515.35 _bSTE |
||
| 100 | _aSteinbach, Olaf | ||
| 245 | _aNumerical approximation methods for elliptic boundary value problems : finite and boundary elements | ||
| 260 |
_bSpringer, _c2008 _aNew York : |
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| 300 |
_axii, 386 p. ; _bill., _c24 cm. |
||
| 365 |
_b1561.00 _c₹ _d01 |
||
| 504 | _aIncludes bibliographical references and index. | ||
| 520 | _aAlthough the aim of this book is to give a unified introduction into finite and boundary element methods, the main focus is on the numerical analysis of boundary integral and boundary element methods. Starting from the variational formulation of elliptic boundary value problems boundary integral operators and associated boundary integral equations are introduced and analyzed. By using finite and boundary elements corresponding numerical approximation schemes are considered. This textbook may serve as a basis for an introductory course in particular for boundary element methods including modern trends such as fast boundary element methods and efficient solution methods, as well as the coupling of finite and boundary element methods. | ||
| 650 | _aBoundary element | ||
| 650 | _aNumerical solutions | ||
| 650 | _aApproximation property | ||
| 650 | _aBoundary element methods | ||
| 650 | _aBilinear form | ||
| 650 | _aDirichlet boundary value | ||
| 650 | _aFundamental solution | ||
| 650 | _aLipschitz domain | ||
| 650 | _aPartial differential equation | ||
| 650 | _aSaddle point | ||
| 650 | _aSchur complement | ||
| 650 | _aSobolev spaces | ||
| 650 | _aVariational problem | ||
| 650 | _aElement method | ||
| 942 |
_2ddc _cBK |
||