The paper is concerned with the formulation of recovery-based a posteriori error estimators. At first we analyze a variant of the wellknown Zienkiewicz–Zhu method, which is here formulated so as to be exact in one dimension for quadratic solutions on non-uniform grids. Next, we discuss two methods which operate directly on the solution, rather than its gradient: one is based on a solution enrichment using the Zienkiewicz–Zhu recovered gradient, while the other consists of a roughening of the solution followed by a Zienkiewicz– Zhu-like recovery. The three new proposed methods are compared in terms of their effectivity indices and solution accuracy to the Zienkiewicz–Zhu estimator, and are applied to representative two- and three-dimensional problems.
On Some New Recovery-Based a Posteriori Error Estimators
MAISANO, GIORGIO;MICHELETTI, STEFANO;PEROTTO, SIMONA;BOTTASSO, CARLO LUIGI
2006-01-01
Abstract
The paper is concerned with the formulation of recovery-based a posteriori error estimators. At first we analyze a variant of the wellknown Zienkiewicz–Zhu method, which is here formulated so as to be exact in one dimension for quadratic solutions on non-uniform grids. Next, we discuss two methods which operate directly on the solution, rather than its gradient: one is based on a solution enrichment using the Zienkiewicz–Zhu recovered gradient, while the other consists of a roughening of the solution followed by a Zienkiewicz– Zhu-like recovery. The three new proposed methods are compared in terms of their effectivity indices and solution accuracy to the Zienkiewicz–Zhu estimator, and are applied to representative two- and three-dimensional problems.| File | Dimensione | Formato | |
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