Sobolev stability of the $L^2$-projection on hybrid meshes
Abstract
We establish $L^p$- and $W^{1,p}$-stability of the $L^2$-projection onto mapped Lagrange finite elements on hybrid meshes consisting of triangles and convex quadrilaterals arising from adaptive mesh refinement. If $K$ is the (tensor product) degree of polynomials of the discretisation, then we show, in particular, $W^{1,2}$-stability for all $K\geq 2$ for the Q-RG and Q-RB refinements. This extends results by Ali, Funken, and Schmidt (2022) which hold for the range $2 \leq K \leq 9$ for initial ...
Description / Details
We establish - and -stability of the -projection onto mapped Lagrange finite elements on hybrid meshes consisting of triangles and convex quadrilaterals arising from adaptive mesh refinement. If is the (tensor product) degree of polynomials of the discretisation, then we show, in particular, -stability for all for the Q-RG and Q-RB refinements. This extends results by Ali, Funken, and Schmidt (2022) which hold for the range for initial meshes consisting of parallelograms. Our proof relies on an extension of the technique by Diening, Storn and Tscherpel (2021) to general convex quadrilaterals.
Source: arXiv:2607.02362v1 - http://arxiv.org/abs/2607.02362v1 PDF: https://arxiv.org/pdf/2607.02362v1 Original Link: http://arxiv.org/abs/2607.02362v1
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Jul 3, 2026
Mathematics
Mathematics
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