Coupled FETI/BETI solvers for nonlinear potential problems in (un ...
Coupled FETI/BETI solvers for nonlinear potential problems in (un ...
Coupled FETI/BETI solvers for nonlinear potential problems in (un ...
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8 Ulrich Langer and Clemens Pechste<strong>in</strong><br />
References<br />
1. A<strong>in</strong>sworth, M. and Guo, B.: Analysis of iterative sub-structur<strong>in</strong>g techniques <strong>for</strong><br />
bo<strong>un</strong>dary element approximation of the hypers<strong>in</strong>gular operator <strong>in</strong> three dimensions,<br />
Appl. Anal. 81(2), 241–280 (2002)<br />
2. Costabel, M.: Symmetric coupl<strong>in</strong>g of f<strong>in</strong>ite elements and bo<strong>un</strong>dary elements. In:<br />
Brebbia, C.A., Kuhn, G., Wendland, W.L. (ed.) Bo<strong>un</strong>dary elements IX, 411–420,<br />
Spr<strong>in</strong>ger, Berl<strong>in</strong> (1987)<br />
3. Farhat, C. and Roux, F.-X.: A method of f<strong>in</strong>ite element tear<strong>in</strong>g and <strong>in</strong>terconnect<strong>in</strong>g<br />
and its parallel solution algorithm, Int. J. Numer. Meth. Engrg., 32,<br />
1205–1227 (1991)<br />
4. Farhat, C., Leso<strong>in</strong>ne, M., and Pierson, K.: A scalable dual-primal doma<strong>in</strong> decomposition<br />
method, Numer. L<strong>in</strong>ear Algebra Appl., 7, 687–714 (2000)<br />
5. Dohrmann, C.R.: A preconditioner <strong>for</strong> substructur<strong>in</strong>g based on constra<strong>in</strong>ed energy<br />
m<strong>in</strong>imization, SIAM J. Sci. Comput., 25(1), 246–258 (2003)<br />
6. Hsiao, G.C., Ste<strong>in</strong>bach, O., Wendland, W.L.: Doma<strong>in</strong> decomposition methods<br />
via bo<strong>un</strong>dary <strong>in</strong>tegral equations, J. Comput. Appl. Math., 125, 521–537 (2000)<br />
7. Klawonn, A., Widl<strong>un</strong>d, O.B.: <strong>FETI</strong> and Neumann-Neumann iterative substructur<strong>in</strong>g<br />
methods: Connections and new results, Comm. Pure Appl. Math., 54,<br />
57–90 (2001)<br />
8. Langer, U.: Parallel iterative solution of symmetric coupled FE/BE-equations via<br />
doma<strong>in</strong> decomposition, Contemp. Math., 157, 335–344 (1994)<br />
9. Langer, U., Of, G., Ste<strong>in</strong>bach, O., Zulehner, W.: Inexact data-sparse bo<strong>un</strong>dary<br />
element tear<strong>in</strong>g and <strong>in</strong>terconnect<strong>in</strong>g methods, SIAM J. Sci. Comp., 29(1), 290–<br />
314 (2007)<br />
10. Langer, U., Pechste<strong>in</strong>, C.: <strong>Coupled</strong> f<strong>in</strong>ite and bo<strong>un</strong>dary element tear<strong>in</strong>g and<br />
<strong>in</strong>terconnect<strong>in</strong>g <strong>solvers</strong> <strong>for</strong> <strong>nonl<strong>in</strong>ear</strong> <strong>potential</strong> <strong>problems</strong>, ZAMM - J. Appl. Math.<br />
Mech., 86(12), 915–931 (2006)<br />
11. Langer, U., Ste<strong>in</strong>bach, O.: Bo<strong>un</strong>dary element tear<strong>in</strong>g and <strong>in</strong>terconnect<strong>in</strong>g methods,<br />
Comput<strong>in</strong>g, 71(3), 205–228 (2003)<br />
12. Langer, U., Ste<strong>in</strong>bach, O.: <strong>Coupled</strong> bo<strong>un</strong>dary and f<strong>in</strong>ite element tear<strong>in</strong>g and<br />
<strong>in</strong>terconnect<strong>in</strong>g methods. In: Kornhuber, R., Hoppe, R., Periaux, J., Pironneau,<br />
O., Widl<strong>un</strong>d, O., Xu, J. (ed.) Proceed<strong>in</strong>gs of the 15th <strong>in</strong>t. conference on doma<strong>in</strong><br />
decomposition. LNCSE, 40, 83–97, Spr<strong>in</strong>ger, Heidelberg (2004)<br />
13. Mandel, J., Dohrmann, C.R., Tezaur, R.: An algebraic theory <strong>for</strong> primal and<br />
dual substructur<strong>in</strong>g methods by constra<strong>in</strong>ts, App. Num. Math., 54, 167–193<br />
(2005)<br />
14. McLean, W.: Strongly elliptic systems and bo<strong>un</strong>dary <strong>in</strong>tegral equations, Cambridge<br />
University Press (2000)<br />
15. Pechste<strong>in</strong>, C., Jüttler, B.: Monotonicity-preserv<strong>in</strong>g <strong>in</strong>terproximation of B-Hcurves,<br />
J. Comp. Appl. Math., 196, 45–57 (2006)<br />
16. Ste<strong>in</strong>bach, O.: Numerische Näher<strong>un</strong>gsverfahren für elliptische Randwertprobleme.<br />
F<strong>in</strong>ite Elemente <strong>un</strong>d Randelemente. B.G. Teubner, Stuttgart, Leipzig,<br />
Wiesbaden (2003)<br />
17. Ste<strong>in</strong>bach, O.: Stability estimates <strong>for</strong> hybrid coupled doma<strong>in</strong> decomposition<br />
methods, Lecture Notes <strong>in</strong> Mathematics, 1809, Spr<strong>in</strong>ger, Berl<strong>in</strong> Heidelberg<br />
(2003)<br />
18. Toselli, A., Widl<strong>un</strong>d, O.: Doma<strong>in</strong> decomposition methods – Algorithms and<br />
theory, Spr<strong>in</strong>ger Series <strong>in</strong> Computational Mathematics, 34, Spr<strong>in</strong>ger, New York<br />
(2005)
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