Average Interpolation under the Maximum Angle Condition

Abstract

Interpolation error estimates needed in common finite element applications using simplicial meshes typically impose restrictions on both the smoothness of the interpolated functions and the shape of the simplices. While the simplest theory can be generalized to admit less smooth functions (e.g., functions in $H^1(\Omega)$ rather than $H^2(\Omega)$) and more general shapes (e.g., the maximum angle condition rather than the minimum angle condition), existing theory does not allow these extensions to be performed simultaneously. By localizing over a well-shaped auxiliary spatial partition, error estimates are established under minimal function smoothness and mesh regularity. This construction is especially important in two cases: $L^p(\Omega)$ estimates for data in $W^{1,p}(\Omega)$ hold for meshes without any restrictions on simplex shape, and $W^{1,p}(\Omega)$ estimates for data in $W^{2,p}(\Omega)$ hold under a generalization of the maximum angle condition which requires $p>2$ for standard Lagrange interp...