Model Reduction for Large Scale Systems

Keil Tim, Ohlberger Mario

Research article (book contribution) | Peer reviewed

Abstract

Projection based model order reduction has become a mature technique for simulation of large classes of parameterized systems. However, several challenges remain for problems where the solution manifold of the parameterized system cannot be well approximated by linear subspaces. While the online efficiency of these model reduction methods is very convincing for problems with a rapid decay of the Kolmogorov n-width, there are still major drawbacks and limitations. Most importantly, the construction of the reduced system in the offline phase is extremely CPU-time and memory consuming for large scale and multi scale systems. For practical applications, it is thus necessary to derive model reduction techniques that do not rely on a classical offline/online splitting but allow for more flexibility in the usage of computational resources. A promising approach with this respect is model reduction with adaptive enrichment. In this contribution we investigate Petrov-Galerkin based model reduction with adaptive basis enrichment within a Trust Region approach for the solution of multi scale and large scale PDE constrained parameter optimization.

Details about the publication

PublisherLirkov Ivan, Margenov Svetozar
Book titleLarge-Scale Scientific Computing
Page range16-28
Publishing companySpringer International Publishing
Place of publicationCham
Title of seriesLecture Notes in Computer Science (LNCS)
Volume of series13127
StatusPublished
Release year2022
Language in which the publication is writtenEnglish
ISBN978-3-030-97549-4
DOI: 10.1007/978-3-030-97549-4_2
Link to the full texthttps://doi.org/10.1007/978-3-030-97549-4_2
KeywordsPDE constraint optimization; reduced basis method; trust region method

Authors from the University of Münster

Keil, Tim
Professorship of Applied Mathematics, especially Numerics (Prof. Ohlberger)
Institute for Analysis and Numerics
Ohlberger, Mario
Professorship of Applied Mathematics, especially Numerics (Prof. Ohlberger)
Center for Nonlinear Science
Center for Multiscale Theory and Computation