Finite element quasi-interpolation and best approximation
Numerical Analysis
2016-10-07 v4
Abstract
This paper introduces a quasi-interpolation operator for scalar- and vector-valued finite element spaces constructed on affine, shape-regular meshes with some continuity across mesh interfaces.This operator gives optimal estimates of the best approximation error in any -norm assuming regularity in the fractional Sobolev spaces , where and the smoothness index can be arbitrarily close to zero. The operator is stable in , leaves the corresponding finite element space point-wise invariant whether homogeneous boundary conditions are imposed or not. The theory is illustrated on -, - and -conforming spaces.
Cite
@article{arxiv.1505.06931,
title = {Finite element quasi-interpolation and best approximation},
author = {Alexandre Ern and Jean-Luc Guermond},
journal= {arXiv preprint arXiv:1505.06931},
year = {2016}
}