Veröffentlichungen von Stefan Sauter

S. S.:
Ein Mehrgitterverfahren zur Berechnung der Eigenschwingungen von abgeschlossenen Wasserbecken.
Universität Heidelberg (1989). \cite{SAUTER:89A}

S. S.:
The ILU method for finite element discretizations.
J. Comp. Appl. Math. 36 (1991), 91-106. \cite{SAUTER:91A}

S. S. and G. WITTUM:
On the computation of the eigenmodes of Lake Constance by means of a multi-grid method.
GMD-Studien of the 3rd European Conference of Multigrid Methods (1991). \cite{SAUTER:91B}

S. S.:
On the stability of the ILU method for a degenerate grid.
Technical-Report 9113, Universität Kiel (1991). \cite{SAUTER:91C}

S. S.:
Der Aufwand der Panel-Clustering-Methode für Integralgleichungen.
Technical-Report 9115, Universität Kiel (1991). \cite{SAUTER:91D}

S. S. and G. WITTUM:
A multigrid method for the computation of eigenmodes of closed water basins.
Impact of Computing in Science and Engineering 4 (1992), 124-152. \cite{SAUTER:92A}

S. S.:
Über die effiziente Verwendung des Galerkinverfahrens zur Lösung Fredholmscher Integralgleichungen.
Phd thesis (1992), Universität Kiel. \cite{SAUTER:92B}

W. HACKBUSCH and S. S.:
On the efficient use of the Galerkin method to solve Fredholm integral equations.
Applications of Mathematics 38 (1993), 301-322. \cite{HACKBUSCH:93A}

S. S.:
On the stability of the ILU method for singular perturbed finite element problems.
Incomplete Decompositions (ILU), Theory, Technique and Applications, Proceedings of the 8th Kieler
GAMM-Seminar (1993), 139-149. \cite{SAUTER:93A}

W. HACKBUSCH and S. S.:
On numerical cubatures of nearly singular surface integrals arising in BEM Collocation.
Computing 52 (1994), 139-159. \cite{HACKBUSCH:94A}

S. S.:
On the efficient implementation of Galerkin-BEM.
ZAMM 74 (1994), T 516-518. \cite{SAUTER:94A}

S. S.:
On the stability of the incomplete Cholesky decomposition for a singular perturbed problem, where the
coefficient matrix is not an M-matrix.
J. Numer. Lin. Alg. Appl. 2 (1995), 17-28. \cite{SAUTER:95A}

I. BABUSKA and S. S.:
Is the pollution effect of the FEM avoidable for the Helmholtz equation considering high wave numbers.
SIAM, J. Numer. Anal. Volume 34 (1997), 2392 - 2423 \cite{BABUSKA:95A}

I. BABUSKA, F. IHLENBURG, E.T.PAIK and S. S.:
A generalized finite element method for solving the Helmholtz equation in two dimensions with minimal pollution.
Comp. Meth. Appl. Mech. Eng. 128 (1995), 325-359. \cite{BABUSKA:95B}

S. S.:
The Panel Clustering Method in 3-d BEM.
Wave Propagation in Complex Media (G. Papanicolaou ed.), Springer, IMA-Volumes in Mathematics
and its Applications 96, 199-224 (1998). \cite{SAUTER:95B}

I. BABUSKA, F. IHLENBURG and S. S.:
Reliability of finite element methods for the numerical computation of waves.
Advances in Engineering Software 28, 417-424 (1997).
\cite{BABUSKA:95C}

S. S. and A. KRAPP:
On the effect of numerical integration in the Galerkin boundary element method.
Numer. Math. 74 (1996), 337-360. \cite{KRAPP:96A}

W. HACKBUSCH and S. S.:
Composite Finite Elements for the approximation of PDEs on domains with complicated micro-structures.
Numer. Math. 75 (1997), 447-472 \cite{HACKBUSCH:97B}

S. S. and C. LAGE:
On the efficient computation of singular and nearly singular surface integrals arising in 3D-Galerkin BEM.
ZAMM 76 (1996), 273-275. \cite{LAGE:96A}

W. HACKBUSCH and S. S.:
Adaptive Composite Finite Elements for the solution of PDEs containing non-uniformly distributed micro-scales.
Technical report 95-2, Universität Kiel (1995),
Matematicheskoe modelirovanie 8, N 9, 31-43 (1996) \cite{HACKBUSCH:96B}

W. HACKBUSCH and S. S.:
A new finite element approach for problems containing small geometric details.
Technical report 95-6, Universität Kiel (1995).
to appear in: Proceedings of the ENUMATH '95-Konferenz, Paris.
In ESAIM-Proceedings (Electronic Journal, WWW-address: http://www.emath.fr/Maths/Proc/procEng.html)
\cite{HACKBUSCH:96C}

W. HACKBUSCH, C. LAGE and S. S.:
On the efficient realization of sparse matrix techniques for integral equations with focus on panel clustering,
cubature and software design aspects.
Boundary Element Topics, Springer, (eds. W.L. Wendland), 51-76 (1997). \cite{HACKBUSCH:96D}

S. S.:
A remark on extension theorems for domains having small geometric details.
Technical report 96-03, Universität Kiel (1996). \cite{SAUTER:96A}

S. S.:
Cubature techniques for 3-d Galerkin BEM.
Boundary Elements: Implementation and Analysis of Advanced Algorithms, W. Hackbusch, G. Wittum eds,
NNNFM 54, Vieweg-Verlag (1996), 29-44. \cite{SAUTER:96B}

S. S. and C. SCHWAB:
Quadrature for hp-Galerkin BEM in 3-d.
Numer. Math. Vol 78 (1997), 211-258 \cite{SAUTER:96C}

S. S. and C. SCHWAB:
Realization of hp-Galerkin BEM in 3-d.
Boundary Elements: Implementation and Analysis of Advanced Algorithms, W. Hackbusch, G. Wittum eds,
NNNFM 54, Vieweg-Verlag (1996), 194-206. \cite{SAUTER:96D}

W. HACKBUSCH and S. S.:
Composite finite elements for problems containing small geometric details. Part II:
Implementation and numerical results.
Computing and Visualization in Science 1 (1997), 15-25 \cite{HACKBUSCH:97F}

K. HAYAMI and S. S.:
A formulation of the Panel-Clustering Method for three-dimensional elastostatics.
Proceedings of the Annual Meeting of the Japanese Society for Industrial and Applied
Mathematics (JSIAM) (1996), 218-219. \cite{HAYAMI:96A}

S. ERICHSEN and S. S.:
Efficient automatic quadrature in 3-d Galerkin BEM.
Computer Methods in Applied Mechanics and Engineering 157, Elsevier, 215-224 (1998). \cite{ERICHSEN:96A}

I.G. GRAHAM, W. HACKBUSCH and S. S.:
The hybrid Galerkin boundary element method.
Proceedings of the First UK Conference on Boundary Integral Methods, (L. Elliot, D.B. Ingham,
D. Lesnic, eds.), Leeds University Press, (1997) 98 - 107, submitted to Numer. Math. \cite{GRAHAM:97A}

K. HAYAMI and S. S.:
A formulation of the panel clustering method for the three-dimensional elastostatic problem.
Proceedings of the JASCOME 13th symposium on BEM, Tokyo, 125-130 (1996) \cite{HAYAMI:96B}

K. HAYAMI and S. S.:
Application of the panel clustering method to the three-dimensional elastostatic problem.
Boundary Elements XIX, Proceedings of the 19th International Conference on the Boundary Element Method,
Rome, 1997, Computational Mechanics Publications, (M. Marchetti, C.A. Brebbia and M.H.Aliabadi, eds.),
625-634 (1997) \cite{HAYAMI:97A}

S.S.:
Composite Finite Elements for problems with complicated boundary. Part III: Essential Boundary Conditions.
Technical-Report 97-16, Universität Kiel (1997).
Submitted to: Computing and Visualization in Sciences. \cite{SAUTER:97A}

I.G. GRAHAM, W. HACKBUSCH and S.S.:
Discrete Boundary Element Methods on General Meshes in 3D.
Technical Report, Bath Mathematics Preprint Number 97/19 (1997), submitted to Numer. Math. \cite{GRAHAM:97B}

S. S. and C. LAGE:
Transformation of hypersingular integrals and black-box cubature.
Technical Report 97-17, Universität Kiel, submitted to Math. Comp. (1997). \cite{LAGE:97A}

S. S. and K. Hayami:
Cost estimation of the panel clustering method applied to 3-D elastostatcs.
submitted to the Proceedings of the EUROBEM `98 conference, Paris, May 1998, (1997). \cite{HAYAMI:98A}

S. S.:
Vergröberung von Finite-Elemente-Räumen.
Habilitationsschrift, Universität Kiel, (1997). \cite{SAUTER:97B}

I.G. GRAHAM, W. HACKBUSCH and S. S.:
Hybrid Galerkin Boundary Elements: Theory and Implementation.
Bericht Nr 98-6, (1998). \cite{GRAHAM:98A}

I.G. GRAHAM, W. HACKBUSCH and S. S.:
Hybrid Galerkin Boundary Elements on Degenerate Meshes.
Technical Report, Bath Mathematics Preprint Number 98/22, (1998). \cite{GRAHAM:98B}

I.G. GRAHAM, W. HACKBUSCH and S. S.:
Fast integration techniques in 3D boundary elements.
Technical Report, Bath Mathematics Preprint Number 98/29, (1998). \cite{GRAHAM:98C}

S. S. and R. WARNKE:
Extension operators and approximation on domains containing small geometric details.
East-West Journal of NUMERICAL MATHEMATICS vol 7 no 1, 61 - 77 (1998). \cite{SAUTER:99A}
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