Adaptive Crouzeix-Raviart boundary element method
Norbert Heuer and Michael Karkulik
ESAIM Math. Model. Num. Anal. 49 (49), 1193-1217, 2015.
For the non-conforming Crouzeix-Raviart boundary elements from
[Heuer, Sayas: Crouzeix-Raviart boundary elements, Numer. Math. 112, 2009],
we develop and analyze a posteriori error estimators based on the h-h/2
methodology. We discuss the optimal rate of convergence for uniform mesh refinement,
and present a numerical experiment with singular data where our adaptive algorithm
recovers the optimal rate while uniform mesh refinement is sub-optimal.
We also discuss the case of reduced regularity by standard geometric singularities
to conjecture that, in this situation, non-uniformly refined meshes are not
superior to quasi-uniform meshes for Crouzeix-Raviart boundary elements.