Multigrid Solution of Automatically Generated High-Order Discretizations for the Biharmonic Equation

Altas, Irfan; Dym, J.; Gupta, Murli M.; Manohar, Ram

doi:10.1137/s1464827596296970

Cited by 67 publications

(71 citation statements)

References 11 publications

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“…Shankar 30 also studied the cavity flow, though he considered only the motion of one endwall and used a numerical method using a truncated eigenfunction expansion. Here we show solutions obtained by a finite difference scheme developed by Altas et al 31 This scheme uses not only the streamfunction as unknown but also the first derivatives. This expands the number of unknowns to three.…”

Section: A Stokes Flow In a Rectangular Cavitymentioning

confidence: 99%

Streamline topologies near simple degenerate critical points in two-dimensional flow away from boundaries

Brøns

Hartnack

1999

Physics of Fluids

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Streamline patterns and their bifurcations in two-dimensional incompressible flow are investigated from a topological point of view. The velocity field is expanded at a point in the fluid, and the expansion coefficients are considered as bifurcation parameters. A series of nonlinear coordinate changes results in a much simplified system of differential equations for the streamlines ͑a normal form͒ encapsulating all the features of the original system. From this, we obtain a complete description of bifurcations up to codimension three close to a simple linear degeneracy. As a special case we develop the theory for flows with reflectional symmetry. We show that all the patterns obtained can be realized in steady Navier-Stokes or Stokes flow, but an unresolved difficulty arises in the symmetric case for Navier-Stokes flow. The theory is applied to the patterns and bifurcations found numerically in two recent studies of Stokes flow in confined domains.

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Section: A Stokes Flow In a Rectangular Cavitymentioning

confidence: 99%

Streamline topologies near simple degenerate critical points in two-dimensional flow away from boundaries

Brøns

Hartnack

1999

Physics of Fluids

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“…al. [1] and Kupferman [5] applied Stephenson's scheme, using a multigrid solver. Stephenson's compact approximation for the biharmonic operator is the following.…”

Section: The Numerical Schemementioning

confidence: 99%

A Compact Scheme for the Streamfunction Formulation of Navier-Stokes Equations

Fishelov

Ben‐Artzi

Croisille

2003

Computational Science and Its Applications — ICCSA 2003

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Abstract. We introduce a pure-streamfunction formulation for the incompressible Navier-Stokes equations. The idea is to replace the vorticity in the vorticity-streamfunction evolution equation by the Laplacianof the streamfunction. The resulting formulation includes the streamfunction only, thus no inter-function relations need to invoked. A compact numerical scheme, which interpolates streamfunction values as well as its first order derivatives, is presented and analyzed.

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“…Due to the significance of the biharmonic operator a large number of methods for discretizing (1) have been proposed. It seems that the majority of these methods are related to the finite elements methodology (see for example [3,10,14,15,29] and references therein).…”

Section: Introductionmentioning

confidence: 99%

“…This method does not require any modifications near the boundary, as the boundary conditions also include the values of ∇Φ [31]. Some variations and a multigrid technique were proposed in [1]. So far, all the algorithms based on the nine-point stencil were only applicable to a rectangular domain.…”

Section: Introductionmentioning

confidence: 99%

A Compact Difference Scheme for the Biharmonic Equation in Planar Irregular Domains

Ben‐Artzi¹,

Chorev²,

Croisille³

et al. 2009

SIAM J. Numer. Anal.

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Abstract. We present a finite difference scheme, applicable to general irregular planar domains, to approximate the biharmonic equation. The irregular domain is embedded in a Cartesian grid. In order to approximate ∆ 2 Φ at a grid point we interpolate the data on the (irregular) stencil by a polynomial of degree six. The finite difference scheme is ∆ 2 Q Φ (0, 0), where Q Φ is the interpolation polynomial. The interpolation polynomial is not uniquely determined. We present a method to construct such an interpolation polynomial and prove that our construction is second order accurate. For a regular stencil, [7] shows that the proposed interpolation polynomial is fourth order accurate. We present some suitable numerical examples.

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Multigrid Solution of Automatically Generated High-Order Discretizations for the Biharmonic Equation

Cited by 67 publications

References 11 publications

Streamline topologies near simple degenerate critical points in two-dimensional flow away from boundaries

Streamline topologies near simple degenerate critical points in two-dimensional flow away from boundaries

A Compact Scheme for the Streamfunction Formulation of Navier-Stokes Equations

A Compact Difference Scheme for the Biharmonic Equation in Planar Irregular Domains

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