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An edge-bubble stabilized finite element method for fourth-order parabolic problems

Publication ,  Journal Article
Kim, TY; Dolbow, JE
Published in: Finite Elements in Analysis and Design
June 1, 2009

We develop an edge-bubble stabilized finite element method for fourth-order parabolic problems. The method begins with a non-conforming approach, in which C0 basis functions are used to approximate the coarse scale of the bulk field. Continuity of function derivatives is enforced at element edges with Lagrange multipliers. The fine-scale bulk field is approximated with higher order edge-bubbles that are held fixed over time slabs, providing for static condensation and an elimination of the multipliers. The resulting formulation shares several common features with recent non-conforming approaches based on Nitsche's method, albeit with the important difference that stability terms follow automatically from the approximation to the fine scale. As an application, we consider the problem of plane Poiseuille flow for a second-gradient fluid. Convergence studies provided for the case of steady flow indicate synchronous rates of convergence in L2 and H1 error norms. Some new time-dependent results for the second-gradient theory are also provided. © 2009 Elsevier B.V. All rights reserved.

Duke Scholars

Published In

Finite Elements in Analysis and Design

DOI

ISSN

0168-874X

Publication Date

June 1, 2009

Volume

45

Issue

8-9

Start / End Page

485 / 494

Related Subject Headings

  • Design Practice & Management
  • 49 Mathematical sciences
  • 40 Engineering
  • 09 Engineering
  • 01 Mathematical Sciences
 

Citation

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Kim, T. Y., & Dolbow, J. E. (2009). An edge-bubble stabilized finite element method for fourth-order parabolic problems. Finite Elements in Analysis and Design, 45(8–9), 485–494. https://doi.org/10.1016/j.finel.2009.02.004
Kim, T. Y., and J. E. Dolbow. “An edge-bubble stabilized finite element method for fourth-order parabolic problems.” Finite Elements in Analysis and Design 45, no. 8–9 (June 1, 2009): 485–94. https://doi.org/10.1016/j.finel.2009.02.004.
Kim TY, Dolbow JE. An edge-bubble stabilized finite element method for fourth-order parabolic problems. Finite Elements in Analysis and Design. 2009 Jun 1;45(8–9):485–94.
Kim, T. Y., and J. E. Dolbow. “An edge-bubble stabilized finite element method for fourth-order parabolic problems.” Finite Elements in Analysis and Design, vol. 45, no. 8–9, June 2009, pp. 485–94. Scopus, doi:10.1016/j.finel.2009.02.004.
Kim TY, Dolbow JE. An edge-bubble stabilized finite element method for fourth-order parabolic problems. Finite Elements in Analysis and Design. 2009 Jun 1;45(8–9):485–494.
Journal cover image

Published In

Finite Elements in Analysis and Design

DOI

ISSN

0168-874X

Publication Date

June 1, 2009

Volume

45

Issue

8-9

Start / End Page

485 / 494

Related Subject Headings

  • Design Practice & Management
  • 49 Mathematical sciences
  • 40 Engineering
  • 09 Engineering
  • 01 Mathematical Sciences