Navigation auf zora.uzh.ch

Search

ZORA (Zurich Open Repository and Archive)

Stabilized reduced-order models for unsteady incompressible flows in three-dimensional parametrized domains

Buoso, Stefano; Manzoni, Andrea; Alkadhi, Hatem; Kurtcuoglu, Vartan (2022). Stabilized reduced-order models for unsteady incompressible flows in three-dimensional parametrized domains. Computers & Fluids, 246:105604.

Abstract

In this work we derive a parametric reduced-order model (ROM) for the unsteady three-dimensional incompressible Navier–Stokes equations without additional pre-processing on the reduced-order subspaces. Concerning the high-fidelity, full-order model, we start from a streamline-upwind Petrov–Galerkin stabilized finite element discretization of the equations using elements for velocity and pressure, respectively. We rely on Galerkin projection of the discretized equations onto reduced basis subspaces for the velocity and the pressure, respectively, obtained through Proper Orthogonal Decomposition on a dataset of snapshots of the full-order model. Both nonlinear and nonaffinely parametrized algebraic operators of the reduced-order system of nonlinear equations, including the projection of the stabilization terms, are efficiently assembled exploiting the Discrete Empirical Interpolation Method (DEIM), and its matrix version (MDEIM), thus obtaining an efficient offline–online computational splitting. We apply the proposed method to (i) a two-dimensional lid-driven cavity flow problem, considering the Reynolds number as parameter, and (ii) a three-dimensional pulsatile flow in stenotic vessels characterized by geometric and physiological parameter variations. We numerically show that the projection of the stabilization terms on the reduced basis subspace and their reconstruction using (M)DEIM allows to obtain a stable ROM with coupled velocity and pressure solutions, without any need for enriching the reduced velocity space, or further stabilizing the ROM. Additionally, we demonstrate that our implementation allows to compute the ROM solution about 20 times faster than the full order model.

Additional indexing

Item Type:Journal Article, refereed, original work
Communities & Collections:04 Faculty of Medicine > Institute of Physiology
07 Faculty of Science > Institute of Physiology
Dewey Decimal Classification:570 Life sciences; biology
610 Medicine & health
Scopus Subject Areas:Physical Sciences > General Computer Science
Physical Sciences > General Engineering
Uncontrolled Keywords:General Engineering, General Computer Science
Language:English
Date:1 October 2022
Deposited On:17 Oct 2022 05:27
Last Modified:28 Aug 2024 01:36
Publisher:Elsevier
ISSN:0045-7930
OA Status:Hybrid
Free access at:Publisher DOI. An embargo period may apply.
Publisher DOI:https://doi.org/10.1016/j.compfluid.2022.105604
Project Information:
  • Funder: Schweizerischer Nationalfonds zur Förderung der Wissenschaftlichen Forschung
  • Grant ID:
  • Project Title:
  • Funder: Swiss National Centre of Competence in Research Kidney Control of Homeostasis
  • Grant ID:
  • Project Title:
Download PDF  'Stabilized reduced-order models for unsteady incompressible flows in three-dimensional parametrized domains'.
Preview
  • Content: Published Version
  • Licence: Creative Commons: Attribution 4.0 International (CC BY 4.0)

Metadata Export

Statistics

Citations

Dimensions.ai Metrics
4 citations in Web of Science®
3 citations in Scopus®
Google Scholar™

Altmetrics

Downloads

34 downloads since deposited on 17 Oct 2022
16 downloads since 12 months
Detailed statistics

Authors, Affiliations, Collaborations

Similar Publications