The content discusses the stability of the Ritz projection in weighted W 1,1 spaces for finite element approximations of the Poisson equation. The authors address this issue by focusing on convex polygonal or polyhedral domains with weights from Muckenhoupt's class A1 and quasi-uniform meshes. They highlight that while stability in some norms is well-established, challenges remain for other norms like W 1,∞(Ω). Recent work has shown improvements in controlling the gradient of the Ritz projection over quasi-uniform meshes, leading to stability results in various spaces. The paper aims to extend these results to cases like W 1,1(Ω) and W 1,1w(Ω) when w ∈ A1 through a modification of previous proofs.
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by Irene Drelic... às arxiv.org 03-14-2024
https://arxiv.org/pdf/2403.07934.pdfPerguntas Mais Profundas