Micropolar fluids using B-spline divergence conforming spaces

Adel Sarmiento, Daniel Garcia, Lisandro Dalcin, Nathan Collier, Victor Calo

Research output: Contribution to journalConference articlepeer-review

5 Scopus citations

Abstract

We discretized the two-dimensional linear momentum, microrotation, energy and mass conservation equations from micropolar fluids theory, with the finite element method, creating divergence conforming spaces based on B-spline basis functions to obtain pointwise divergence free solutions [8]. Weak boundary conditions were imposed using Nitsche's method for tangential conditions, while normal conditions were imposed strongly. Once the exact mass conservation was provided by the divergence free formulation, we focused on evaluating the differences between micropolar fluids and conventional fluids, to show the advantages of using the micropolar fluid model to capture the features of complex fluids. A square and an arc heat driven cavities were solved as test cases. A variation of the parameters of the model, along with the variation of Rayleigh number were performed for a better understanding of the system. The divergence free formulation was used to guarantee an accurate solution of the flow. This formulation was implemented using the framework PetIGA as a basis, using its parallel stuctures to achieve high scalability. The results of the square heat driven cavity test case are in good agreement with those reported earlier.

Original languageEnglish
Pages (from-to)991-1001
Number of pages11
JournalProcedia Computer Science
Volume29
DOIs
StatePublished - 2014
Externally publishedYes
Event14th Annual International Conference on Computational Science, ICCS 2014 - Cairns, QLD, Australia
Duration: Jun 10 2014Jun 12 2014

Funding

This work was supported by the King Abdullah University of Science and Technology KAUST, and the Numerical Porous Media Center NumPor.

FundersFunder number
King Abdullah University of Science and Technology

    Keywords

    • Divergence free
    • Divergence-conforming B-splines
    • Incompressible flows
    • Isogeometric finite element method
    • Micropolar fluids

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