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An optimal-order -error estimate for nonsymmetric discontinuous Galerkin methods for a parabolic equation in multiple space dimensions

✍ Scribed by Kaixin Wang; Hong Wang; Shuyu Sun; Mary F. Wheeler

Publisher
Elsevier Science
Year
2009
Tongue
English
Weight
251 KB
Volume
198
Category
Article
ISSN
0045-7825

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✦ Synopsis

We analyze the nonsymmetric discontinuous Galerkin methods (NIPG and IIPG) for linear elliptic and parabolic equations with a spatially varied coefficient in multiple spatial dimensions. We consider d-linear approximation spaces on a uniform rectangular mesh, but our results can be extended to smoothly varying rectangular meshes. Using a blending or Boolean interpolation, we obtain a superconvergence error estimate in a discrete energy norm and an optimal-order error estimate in a semi-discrete norm for the parabolic equation. The L 2 -optimality for the elliptic problem follows directly from the parabolic estimates. Numerical results are provided to validate our theoretical estimates. We also discuss the impact of penalty parameters on convergence behaviors of NIPG.

πŸ“œ SIMILAR VOLUMES

Error estimates for a discretized Galerk
Error estimates for a discretized Galerkin method for a boundary integral equation in two dimensions
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## Abstract We present __a priori__ and __a posteriori__ estimates for the error between the Galerkin and a discretized Galerkin method for the boundary integral equation for the single layer potential on the square plate. Using piecewise constant finite elements on a rectangular mesh we study the