Fernando D. Gaspoz, Pedro Morin
Published 2008-03-27Version 1
In this article we prove that it is possible to construct, using newest-vertex bisection, meshes that equidistribute the error in $H^1$-norm, whenever the function to approximate can be decomposed as a sum of a regular part plus a singular part with singularities around a finite number of points. This decomposition is usual in regularity results of Partial Differential Equations (PDE). As a consequence, the meshes turn out to be quasi-optimal, and convergence rates for adaptive finite element methods (AFEM) using Lagrange finite elements of any polynomial degree are obtained.
Adaptive finite element methods for partial differential equations
Convergence of adaptive finite element methods for eigenvalue problems
Convergence rates in $\ell^1$-regularization when the basis is not smooth enough
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