Efficient and reliable hierarchical error estimates for an elliptic obstacle problem
Applied Numerical Mathematics
A Novel Hierarchial Error Estimate for Elliptic Obstacle Problems
Journal of Scientific Computing
An adaptive Newton multigrid method for a model of marine ice sheets
Journal of Computational Physics
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We present a hierarchical a posteriori error analysis for the minimum value of the energy functional in symmetric obstacle problems. The main result is that the error in the energy minimum is, up to oscillation terms, equivalent to an appropriate hierarchical estimator. The proof does not invoke any saturation assumption. We even show that small oscillation implies a related saturation assumption. In addition, we prove efficiency and reliability of an a posteriori estimate of the discretization error and thereby cast some light on the theoretical understanding of previous hierarchical estimators. Finally, we illustrate our theoretical results by numerical computations.