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The SDFEM for a Convection-Diffusion Problem with a Boundary Layer: Optimal Error Analysis and Enhancement of Accuracy
Ist Teil von
SIAM journal on numerical analysis, 2003-01, Vol.41 (5), p.1620-1642
Ort / Verlag
Philadelphia: Society for Industrial and Applied Mathematics
Erscheinungsjahr
2003
Link zum Volltext
Quelle
Alma/SFX Local Collection
Beschreibungen/Notizen
The streamline-diffusion finite element method (SDFEM) is applied to a convection-diffusion problem posed on the unit square, using a Shishkin rectangular mesh with piecewise bilinear trial functions. The hypotheses of the problem exclude interior layers but allow exponential boundary layers. An error bound is proved for $\|u^I-u^N\|_{SD}$, where $u^I$ is the interpolant of the solution $u$, $u^N$ is the SDFEM solution, and $\|\cdot\|_{SD}$ is the streamline-diffusion norm. This bound implies that $\|u-u^N\|_{L^2}$ is of optimal order, thereby settling an open question regarding the $L^2$-accuracy of the SDFEM on rectangular meshes. Furthermore, the bound shows that $u^N$ is superclose to $u^I$, which allows the construction of a simple postprocessing that yields a more accurate solution. Enhancement of the rate of convergence by using a discrete streamline-diffusion norm is also discussed. Finally, the verification of these rates of convergence by numerical experiments is examined, and it is shown that this practice is less reliable than was previously believed.