Adaptive Spectral Galerkin Methods with Dynamic Marking
Numerical Analysis
2015-11-03 v1
Abstract
The convergence and optimality theory of adaptive Galerkin methods is almost exclusively based on the D\"orfler marking. This entails a fixed parameter and leads to a contraction constant bounded below away from zero. For spectral Galerkin methods this is a severe limitation which affects performance. We present a dynamic marking strategy that allows for a super-linear relation between consecutive discretization errors, and show exponential convergence with linear computational complexity whenever the solution belongs to a Gevrey approximation class.
Cite
@article{arxiv.1511.00233,
title = {Adaptive Spectral Galerkin Methods with Dynamic Marking},
author = {Claudio Canuto and Ricardo H. Nochetto and Rob Stevenson and Marco Verani},
journal= {arXiv preprint arXiv:1511.00233},
year = {2015}
}
Comments
20 pages