TY - JOUR
T1 - Simultaneous reduced basis approximation of parameterized elliptic eigenvalue problems
AU - Horger, Thomas
AU - Wohlmuth, Barbara
AU - Dickopf, Thomas
N1 - Publisher Copyright:
© EDP Sciences, SMAI 2017.
PY - 2017
Y1 - 2017
N2 - The focus is on a model reduction framework for parameterized elliptic eigenvalue problems by a reduced basis method. In contrast to the standard single output case, one is interested in approximating several outputs simultaneously, namely a certain number of the smallest eigenvalues. For a fast and reliable evaluation of these input-output relations, we analyze a posteriori error estimators for eigenvalues. Moreover, we present different greedy strategies and study systematically their performance. Special attention needs to be paid to multiple eigenvalues whose appearance is parameter-dependent. Our methods are of particular interest for applications in vibro-acoustics.
AB - The focus is on a model reduction framework for parameterized elliptic eigenvalue problems by a reduced basis method. In contrast to the standard single output case, one is interested in approximating several outputs simultaneously, namely a certain number of the smallest eigenvalues. For a fast and reliable evaluation of these input-output relations, we analyze a posteriori error estimators for eigenvalues. Moreover, we present different greedy strategies and study systematically their performance. Special attention needs to be paid to multiple eigenvalues whose appearance is parameter-dependent. Our methods are of particular interest for applications in vibro-acoustics.
KW - A posteriori error estimation
KW - Eigenvalue problem
KW - Finite element method
KW - Model reduction
KW - Multiple eigenvalues
KW - Parameter-dependent partial differential equation
KW - Reduced basis method
UR - http://www.scopus.com/inward/record.url?scp=85032362319&partnerID=8YFLogxK
U2 - 10.1051/m2an/2016025
DO - 10.1051/m2an/2016025
M3 - Article
AN - SCOPUS:85032362319
SN - 2822-7840
VL - 51
SP - 443
EP - 465
JO - Mathematical Modelling and Numerical Analysis
JF - Mathematical Modelling and Numerical Analysis
IS - 2
ER -