Efficient reduced models and a posteriori error estimation for parametrized dynamical systems by offline/online decomposition

Haasdonk B, Ohlberger M

Research article (journal) | Peer reviewed

Abstract

We address the problem of model order reduction (MOR) of parametrized dynamical systems. Motivated by reduced basis (RB) methods for partial differential equations, we show that some characteristic components can be transferred to model reduction of parametrized linear dynamical systems. We assume an affine parameter dependence of the system components, which allows an offline/online decomposition and is the basis for efficient reduced simulation. Additionally, error control is possible by a posteriori error estimators for the state vector and output vector, based on residual analysis and primal-dual techniques. Experiments demonstrate the applicability of the reduced parametrized systems, the reliability of the error estimators and the runtime gain by the reduction technique. The a posteriori error estimation technique can straightforwardly be applied to all traditional projection-based reduction techniques of non-parametric and parametric linear systems, such as model reduction, balanced truncation, moment matching, proper orthogonal decomposition (POD) and so on.

Details about the publication

JournalMathematical and Computer Modelling of Dynamical Systems
Volume17
Issue2
Page range145-161
StatusPublished
Release year2011
Language in which the publication is writtenEnglish
DOI: 10.1080/13873954.2010.514703
Keywordsparametrized dynamical systems; model order reduction; a posteriori error estimation; off-/online decomposition

Authors from the University of Münster

Ohlberger, Mario
Professorship of Applied Mathematics, especially Numerics (Prof. Ohlberger)
Center for Nonlinear Science