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200 1 $aBEM-based Finite Element Approaches on Polytopal Meshes$fSteffen Weißer
210   $aCham$cSpringer$d2019
215   $axvii, 235 p.$cill.$d24 cm
410  1$1001VAN0027129$12001 $aLecture notes in computational science and engineering$1210  $aBerlin [etc.]$cSpringer$v130
500  1$3VAN0236689$aBEM-based Finite Element Approaches on Polytopal Meshes$91668174
606   $a65Nxx$xNumerical methods for partial differential equations, boundary value problems [MSC 2020]$3VANC020832$2MF
606   $a41-XX$xApproximations and expansions [MSC 2020]$3VANC022010$2MF
606   $a65Dxx$xNumerical approximation and computational geometry (primarily algorithms) [MSC 2020]$3VANC022980$2MF
610   $aAdaptive mesh refinement$9KW:K
610   $aAnisotropic mesh$9KW:K
610   $aBEM-based FEM$9KW:K
610   $aBoundary Element Methods$9KW:K
610   $aConvection-dominated problem$9KW:K
610   $aDual-weighted residual estimator$9KW:K
610   $aMixed finite element method$9KW:K
610   $aNon-standard finite element method$9KW:K
610   $aNyström method$9KW:K
610   $aPoincaré constant$9KW:K
610   $aPolygonal finite elements$9KW:K
610   $aPolygonal mesh$9KW:K
610   $aPolyhedral mesh$9KW:K
610   $aQuasi-interpolation$9KW:K
610   $aResidual based error estimate$9KW:K
610   $aTrefftz-like basis functions$9KW:K
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