A Numerically Stable A Posteriori Error Estimator for Reduced Basis Approximations of Elliptic Equations
Buhr A, Engwer C, Ohlberger M, Rave S
Research article in edited proceedings (conference) | Peer reviewedAbstract
The Reduced Basis (RB) method is a well established method for the model order reduction of problems formulated as parametrized partial differential equations. One crucial requirement for the application of RB schemes is the availability of an a posteriori error estimator to reliably estimate the error introduced by the reduction process. However, straightforward implementations of standard residual based estimators show poor numerical stability, rendering them unusable if high accuracy is required. In this work we propose a new algorithm based on representing the residual with respect to a dedicated orthonormal basis, which is both easy to implement and requires little additional computational overhead. A numerical example is given to demonstrate the performance of the proposed algorithm.
Details about the publication
Authors from the University of Münster
| Buhr, Andreas | Professorship of Applied Mathematics, especially Numerics (Prof. Ohlberger) |
| Engwer, Christian | Professorship for Applications of Partial Differential Equations |
| Ohlberger, Mario | Professorship of Applied Mathematics, especially Numerics (Prof. Ohlberger) Center for Nonlinear Science Center for Multiscale Theory and Computation |
| Rave, Stephan | Professorship of Applied Mathematics, especially Numerics (Prof. Ohlberger) |