Alan F. Hegarty scite author profile

A singularly perturbed convection-diffusion problem, with a discontinuous convection coefficient and a singular perturbation parameter ε, is examined. Due to the discontinuity an interior layer appears in the solution. A finite difference method is constructed for solving this problem, which generates ε-uniformly convergent numerical approximations to the solution. The method uses a piecewise uniform mesh, which is fitted to the interior layer, and the standard upwind finite difference operator on this mesh. The main theoretical result is the ε-uniform convergence in the global maximum norm of the approximations generated by this finite difference method. Numerical results are presented, which are in agreement with the theoretical results.

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Singularly perturbed convection–diffusion problems with boundary and weak interior layers

Farrell

Hegarty

Miller

et al. 2004

Journal of Computational and Applied Mathematics

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A Comparison of Uniformly Convergent Difference Schemes for Two-Dimensional Convection—Diffusion Problems

Hegarty¹,

O’Riordan²,

Stynes³

1993

Journal of Computational Physics

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Special Meshes for Finite Difference Approximations to an Advection-Diffusion Equation with Parabolic Layers

Hegarty

Miller

O’Riordan

et al. 1995

Journal of Computational Physics

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Alan F. Hegarty

Robust Computational Techniques for Boundary Layers

Global maximum norm parameter-uniform numerical method for a singularly perturbed convection-diffusion problem with discontinuous convection coefficient

Singularly perturbed convection–diffusion problems with boundary and weak interior layers

A Comparison of Uniformly Convergent Difference Schemes for Two-Dimensional Convection—Diffusion Problems

Special Meshes for Finite Difference Approximations to an Advection-Diffusion Equation with Parabolic Layers

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