On a posteriori error estimates for the linear triangular finite element |
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Authors: | Jikun Zhao Shaochun Chen |
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Affiliation: | 1. Department of Mathematics, Zhengzhou University, Zhengzhou, 450001, China
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Abstract: | Based on equilibration of side fluxes, an a posteriori error estimator is obtained for the linear triangular element for the Poisson equation, which can be computed locally. We present a procedure for constructing the estimator in which we use the Lagrange multiplier similar to the usual equilibrated residual method introduced by Ainsworth and Oden. The estimator is shown to provide guaranteed upper bound, and local lower bounds on the error up to a multiplicative constant depending only on the geometry. Based on this, we give another error estimator which can be directly constructed without solving local Neumann problems and also provide the two-sided bounds on the error. Finally, numerical tests show our error estimators are very efficient. |
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