Global a priori convergence theory for reduced-basis approximations of single-parameter symmetric coercive elliptic partial differential equations
Open Access
- 31 December 2002
- journal article
- Published by Cellule MathDoc/Centre Mersenne in Comptes Rendus Mathematique
- Vol. 335 (3), 289-294
- https://doi.org/10.1016/s1631-073x(02)02466-4
Abstract
International audienceWe consider "Lagrangian" reduced-basis methods for single-parameter symmetric coercive elliptic partial differential equations. We show that, for a logarithmic-(quasi-)uniform distribution of sample points, the reduced-basis approximation converges exponentially to the exact solution uniformly in parameter space. Furthermore, the convergence rate depends only weakly on the continuity-coercivity ratio of the operator: thus very low- dimensional approximations yield accurate solutions even for very wide parametric ranges. Numerical tests (reported elsewhere) corroborate the theoretical preditionsKeywords
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