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A heterogeneous multiscale modeling framework for hierarchical systems of partial differential equations

Publication ,  Journal Article
Masud, A; Scovazzi, G
Published in: International Journal for Numerical Methods in Fluids
January 1, 2011

This paper presents a heterogeneous multiscale method with efficient interscale coupling for scale-dependent phenomena modeled via a hierarchy of partial differential equations. Physics at the global level is governed by one set of partial differential equations, whereas features in the solution that are beyond the resolution capability of the coarser models are accounted for by the next refined set of differential equations. The proposed method seamlessly integrates different sets of equations governing physics at various levels, and represents a consistent top-down and bottom-up approach to multi-model modeling problems. For the top-down coupling of equations, this method provides a variational residual-based embedding of the response from the coarser or global system equations, into the corresponding local or refined system equations. To account for the effects of local phenomena on the global response of the system, the method also accommodates bottom-up embedding of the response from the local or refined mathematical models into the global or coarser model equations. The resulting framework thus provides a consistent way of coupling physics between disparate partial differential equations by means of up-scaling and down-scaling of the mathematical models. An integral aspect of the proposed framework is an uncertainty quantification and error estimation module. The structure of this error estimator is investigated and its mathematical implications are delineated. Copyright © 2010 John Wiley & Sons, Ltd.

Duke Scholars

Published In

International Journal for Numerical Methods in Fluids

DOI

EISSN

1097-0363

ISSN

0271-2091

Publication Date

January 1, 2011

Volume

65

Issue

1-3

Start / End Page

28 / 42

Related Subject Headings

  • Applied Mathematics
  • 51 Physical sciences
  • 49 Mathematical sciences
  • 40 Engineering
  • 09 Engineering
  • 02 Physical Sciences
  • 01 Mathematical Sciences
 

Citation

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Masud, A., & Scovazzi, G. (2011). A heterogeneous multiscale modeling framework for hierarchical systems of partial differential equations. International Journal for Numerical Methods in Fluids, 65(1–3), 28–42. https://doi.org/10.1002/fld.2456
Masud, A., and G. Scovazzi. “A heterogeneous multiscale modeling framework for hierarchical systems of partial differential equations.” International Journal for Numerical Methods in Fluids 65, no. 1–3 (January 1, 2011): 28–42. https://doi.org/10.1002/fld.2456.
Masud A, Scovazzi G. A heterogeneous multiscale modeling framework for hierarchical systems of partial differential equations. International Journal for Numerical Methods in Fluids. 2011 Jan 1;65(1–3):28–42.
Masud, A., and G. Scovazzi. “A heterogeneous multiscale modeling framework for hierarchical systems of partial differential equations.” International Journal for Numerical Methods in Fluids, vol. 65, no. 1–3, Jan. 2011, pp. 28–42. Scopus, doi:10.1002/fld.2456.
Masud A, Scovazzi G. A heterogeneous multiscale modeling framework for hierarchical systems of partial differential equations. International Journal for Numerical Methods in Fluids. 2011 Jan 1;65(1–3):28–42.
Journal cover image

Published In

International Journal for Numerical Methods in Fluids

DOI

EISSN

1097-0363

ISSN

0271-2091

Publication Date

January 1, 2011

Volume

65

Issue

1-3

Start / End Page

28 / 42

Related Subject Headings

  • Applied Mathematics
  • 51 Physical sciences
  • 49 Mathematical sciences
  • 40 Engineering
  • 09 Engineering
  • 02 Physical Sciences
  • 01 Mathematical Sciences