Irfan Altas scite author profile

In this work, we use a symbolic algebra package to derive a family of finite difference approximations for the biharmonic equation on a 9-point compact stencil. The solution and its first derivatives are carried as unknowns at the grid points. Dirichlet boundary conditions are thus incorporated naturally. Since the approximations use the 9-point compact stencil, no special formulas are needed near the boundaries. Both second-order and fourth-order discretizations are derived.The fourth-order approximations produce more accurate results than the 13-point classical stencil or the commonly used system of two second-order equations coupled with the boundary condition.The method suffers from slow convergence when classical iteration methods such as Gauss-Seidel or SOR are employed. In order to alleviate this problem we propose several multigrid techniques that exhibit grid-independent convergence and solve the biharmonic equation in a small amount of computer time. Test results from three different problems, including Stokes flow in a driven cavity, are reported.

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Approximation of a Thin Plate Spline Smoother Using Continuous Piecewise Polynomial Functions

Roberts¹,

Hegland²,

Altas³

2003

SIAM J. Numer. Anal.

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A variational approach to the radiometric enhancement of digital imagery

Altas

Louis

Belward

1995

IEEE Trans. on Image Process.

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In this correspondence, we present a variational approach to the problem of finding suitable radiometric image transformations that optimize desirable characteristics of the output image histogram. This variational approach can be interpreted as the minimization of the cumulative spacing between histogram bars in the least squares sense subject to some weight function. Most of the common histogram transformation procedures used in remote sensing applications can be deduced from this general variational approach with an appropriate choice of the weight function.

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A high accuracy defect-correction multigrid method for the steady incompressible Navier-Stokes equations

Altas

Burrage

1994

Journal of Computational Physics

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A two-dimensional adaptive mesh generation method

Altas

Stephenson

1991

Journal of Computational Physics

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Irfan Altas

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

Approximation of a Thin Plate Spline Smoother Using Continuous Piecewise Polynomial Functions

A variational approach to the radiometric enhancement of digital imagery

A high accuracy defect-correction multigrid method for the steady incompressible Navier-Stokes equations

A two-dimensional adaptive mesh generation method

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