Abstract
Abstract This paper gives a direct proof of localization of dual norms of bounded linear functionals on the Sobolev space ${W^{1,p}_0(\varOmega )}$, $1 \leq p \leq \infty $. The basic condition is that the functional in question vanishes over locally supported test functions from ${W^{1,p}_0(\varOmega )}$ which form a partition of unity in $\varOmega $, apart from close to the boundary $\partial \varOmega $. We also study how to weaken this condition. The results allow in particular to establish local efficiency and robustness with respect to the exponent $p$ of a posteriori estimates for nonlinear partial differential equations in divergence form, including the case of inexact solvers. Numerical illustrations support the theory.
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