000 | 02985nam a22004935i 4500 | ||
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001 | 978-3-540-36250-0 | ||
003 | DE-He213 | ||
005 | 20160624101755.0 | ||
007 | cr nn 008mamaa | ||
008 | 121227s2003 gw | s |||| 0|eng d | ||
020 |
_a9783540362500 _9978-3-540-36250-0 |
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024 | 7 |
_a10.1007/b80164 _2doi |
|
050 | 4 | _aQA297-299.4 | |
072 | 7 |
_aPBKS _2bicssc |
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072 | 7 |
_aMAT021000 _2bisacsh |
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072 | 7 |
_aMAT006000 _2bisacsh |
|
082 | 0 | 4 |
_a518 _223 |
100 | 1 |
_aSteinbach, Olaf. _eauthor. |
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245 | 1 | 0 |
_aStability Estimates for Hybrid Coupled Domain Decomposition Methods _h[electronic resource] / _cby Olaf Steinbach. |
260 | 1 |
_aBerlin, Heidelberg : _bSpringer Berlin Heidelberg, _c2003. |
|
264 | 1 |
_aBerlin, Heidelberg : _bSpringer Berlin Heidelberg, _c2003. |
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300 |
_aVI, 126 p. _bonline resource. |
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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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347 |
_atext file _bPDF _2rda |
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490 | 1 |
_aLecture Notes in Mathematics, _x1617-9692 ; _v1809 |
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505 | 0 | _aPreliminaries -- Sobolev Spaces: Saddle Point Problems; Finite Element Spaces; Projection Operators; Quasi Interpolation Operators -- Stability Results: Piecewise Linear Elements; Dual Finite Element Spaces; Higher Order Finite Element Spaces; Biorthogonal Basis Functions -- The Dirichlet-Neumann Map for Elliptic Problems: The Steklov-Poincare Operator; The Newton Potential; Approximation by Finite Element Methods; Approximation by Boundary Element Methods -- Mixed Discretization Schemes: Variational Methods with Approximate Steklov-Poincare Operators; Lagrange Multiplier Methods -- Hybrid Coupled Domain Decomposition Methods: Dirichlet Domain Decomposition Methods; A Two-Level Method; Three-Field Methods; Neumann Domain Decomposition Methods;Numerical Results; Concluding Remarks -- References. | |
520 | _a Domain decomposition methods are a well established tool for an efficient numerical solution of partial differential equations, in particular for the coupling of different model equations and of different discretization methods. Based on the approximate solution of local boundary value problems either by finite or boundary element methods, the global problem is reduced to an operator equation on the skeleton of the domain decomposition. Different variational formulations then lead to hybrid domain decomposition methods. . | ||
650 | 0 | _aMathematics. | |
650 | 0 | _aDifferential equations, partial. | |
650 | 0 | _aNumerical analysis. | |
650 | 1 | 4 | _aMathematics. |
650 | 2 | 4 | _aNumerical Analysis. |
650 | 2 | 4 | _aPartial Differential Equations. |
710 | 2 | _aSpringerLink (Online service) | |
773 | 0 | _tSpringer eBooks | |
776 | 0 | 8 |
_iPrinted edition: _z9783540002772 |
786 | _dSpringer | ||
830 | 0 |
_aLecture Notes in Mathematics, _x1617-9692 ; _v1809 |
|
856 | 4 | 0 | _uhttp://dx.doi.org/10.1007/b80164 |
942 |
_2EBK258 _cEBK |
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999 |
_c29552 _d29552 |