Some p-robust a posteriori error estimates based on auxiliary spaces
Abstract
This work develops polynomial-degree-robust (p-robust) equilibrated a posteriori error estimates for H( curl), H( div) and H( divdiv) problems, based on H1 auxiliary space decomposition. The proposed framework employs auxiliary space preconditioning and regular decompositions to decompose the finite element residual into H-1 residuals that are further controlled by classical p-robust equilibrated a posteriori error analysis. As a result, we obtain novel and simple p-robust a posteriori error estimates of H( curl)/H( div) conforming methods and mixed methods for the biharmonic equation. In addition, we prove guaranteed a posteriori upper error bounds under convex domains or certain boundary conditions. Numerical experiments demonstrate the effectiveness and p-robustness of the proposed error estimators for the N\'ed\'elec edge element methods and the Hellan--Herrmann--Johnson methods.
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