High order discontinuous Galerkin methods on surfaces
Abstract
We derive and analyze high order discontinuous Galerkin methods for second-order elliptic problems on implicitely defined surfaces in R3. This is done by carefully adapting the unified discontinuous Galerkin framework of Arnold et al. [2002] on a triangulated surface approximating the smooth surface. We prove optimal error estimates in both a (mesh dependent) energy norm and the L2 norm.
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