Το work with title Output bounds for reduced-basis approximations of symmetric positive definite eigenvalue problems by Rovas Dimitrios, Pateras, Anthony, 1979-, Ivan B. Oliveira, Maday, Yvon, 1957-, Luc Machiels is licensed under Creative Commons Attribution 4.0 International
Bibliographic Citation
L. Machiels, Y. Maday, I.B. Oliveira, A.T. Patera, D.V. Rovas ,"Output bounds for reduced-basis approximations of symmetric positive definite eigenvalue problems."
Comp. Rendus de l'Acad. des Sc.Series I-Math.,vol. 331 ,no.2 ,pp.153-158,2000.doi:10.1016/S0764-4442(00)00270-6
https://doi.org/10.1016/S0764-4442(00)00270-6
We propose a new reduced-basis output bound method for the symmetric eigenvalue problem. The numerical procedure consists of two stages: the pre-processing stage, in which the reduced basis and associated functions are computed—“off-line”—at a prescribed set of points in parameter space; and the real-time stage, in which the approximate output of interest and corresponding rigorous error bounds are computed—“on-line”—for any new parameter value of interest. The real time calculation is very inexpensive as it requires only the solution or evaluation of very small systems. We introduce the procedure; prove the asymptotic bounding properties and optimal convergence rate of the error estimator; discuss computational considerations; and, finally, present corroborating numerical results.