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An adaptive local reduced basis method for solving PDEs with uncertain inputs and evaluating risk

Publication ,  Journal Article
Zou, Z; Kouri, D; Aquino, W
Published in: Computer Methods in Applied Mechanics and Engineering
March 1, 2019

Many physical systems are modeled using partial differential equations (PDEs) with uncertain or random inputs. For such systems, naively propagating a fixed number of samples of the input probability law (or an approximation thereof) through the PDE is often inadequate to accurately quantify the “risk” associated with critical system responses. In this paper, we develop a goal-oriented, adaptive sampling and local reduced basis approximation for PDEs with random inputs. Our method determines a set of samples and an associated (implicit) Voronoi partition of the parameter domain on which we build local reduced basis approximations of the PDE solution. The samples are selected in an adaptive manner using an a posteriori error indicator. A notable advantage of the proposed approach is that the computational cost of the approximation during the adaptive process remains constant. We provide theoretical error bounds for our approximation and numerically demonstrate the performance of our method when compared to widely used adaptive sparse grid techniques. In addition, we tailor our approach to accurately quantify the risk of quantities of interest that depend on the PDE solution. We demonstrate our method on an advection–diffusion example and a Helmholtz example.

Duke Scholars

Published In

Computer Methods in Applied Mechanics and Engineering

DOI

ISSN

0045-7825

Publication Date

March 1, 2019

Volume

345

Start / End Page

302 / 322

Related Subject Headings

  • Applied Mathematics
  • 49 Mathematical sciences
  • 40 Engineering
  • 09 Engineering
  • 01 Mathematical Sciences
 

Citation

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Zou, Z., Kouri, D., & Aquino, W. (2019). An adaptive local reduced basis method for solving PDEs with uncertain inputs and evaluating risk. Computer Methods in Applied Mechanics and Engineering, 345, 302–322. https://doi.org/10.1016/j.cma.2018.10.028
Zou, Z., D. Kouri, and W. Aquino. “An adaptive local reduced basis method for solving PDEs with uncertain inputs and evaluating risk.” Computer Methods in Applied Mechanics and Engineering 345 (March 1, 2019): 302–22. https://doi.org/10.1016/j.cma.2018.10.028.
Zou Z, Kouri D, Aquino W. An adaptive local reduced basis method for solving PDEs with uncertain inputs and evaluating risk. Computer Methods in Applied Mechanics and Engineering. 2019 Mar 1;345:302–22.
Zou, Z., et al. “An adaptive local reduced basis method for solving PDEs with uncertain inputs and evaluating risk.” Computer Methods in Applied Mechanics and Engineering, vol. 345, Mar. 2019, pp. 302–22. Scopus, doi:10.1016/j.cma.2018.10.028.
Zou Z, Kouri D, Aquino W. An adaptive local reduced basis method for solving PDEs with uncertain inputs and evaluating risk. Computer Methods in Applied Mechanics and Engineering. 2019 Mar 1;345:302–322.
Journal cover image

Published In

Computer Methods in Applied Mechanics and Engineering

DOI

ISSN

0045-7825

Publication Date

March 1, 2019

Volume

345

Start / End Page

302 / 322

Related Subject Headings

  • Applied Mathematics
  • 49 Mathematical sciences
  • 40 Engineering
  • 09 Engineering
  • 01 Mathematical Sciences