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$L^{2}$ -error estimates for Dirichlet and Neumann problems on anisotropic finite element meshes

Thomas Apel, Dieter Sirch (2011)

Applications of Mathematics

An $L^{2}$ -estimate of the finite element error is proved for a Dirichlet and a Neumann boundary value problem on a three-dimensional, prismatic and non-convex domain that is discretized by an anisotropic tetrahedral mesh. To this end, an approximation error estimate for an interpolation operator that is preserving the Dirichlet boundary conditions is given. The challenge for the Neumann problem is the proof of a local interpolation error estimate for functions from a weighted Sobolev space.

Local error estimates and adaptive refinement for first-order system least squares (FOSLS).

Berndt, Markus, Manteuffel, Thomas A., McCormick, Stephen F. (1997)

ETNA. Electronic Transactions on Numerical Analysis [electronic only]

Local refinement techniques for elliptic problems on cell-centered grids. III. Algebraic multilevel BEPS preconditioners.

R.D. Lazarov, R.E. Ewing, ... (1991)

Numerische Mathematik

Displaying 1 – 3 of 3

L 2 -error estimates for Dirichlet and Neumann problems on anisotropic finite element meshes

Local error estimates and adaptive refinement for first-order system least squares (FOSLS).

Local refinement techniques for elliptic problems on cell-centered grids. III. Algebraic multilevel BEPS preconditioners.

Currently displaying 1 – 3 of 3

$L^{2}$ -error estimates for Dirichlet and Neumann problems on anisotropic finite element meshes