Absolute Stable Homotopy Finite Element Methods for Circular Arch Problem and Asymptotic Exactness Posteriori Error Estimate
Year: 2002
Author: Min-Fu Feng, Ping-Bing Ming, Rong-Kui Yang
Journal of Computational Mathematics, Vol. 20 (2002), Iss. 6 : pp. 653–672
Abstract
In this paper, HFEM is proposed to investigate the circular arch problem. Optimal error estimates are derived, some superconvergence results are established, and an asymptotic exactness posteriori error estimator is presented. In contrast with the classical displacement variational method, the optimal convergence rate for displacement is uniform to the small parameter. In contrast with classical mixed finite element methods, our results are free of the strict restriction on h (the mesh size) which is preserved by all the previous papers. Furtheremore, we introduce an asymptotic exactness posteriori error estimator based on a global superconvergence result which is discovered in this kind of problem for the first time.
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Journal Article Details
Publisher Name: Global Science Press
Language: English
DOI: https://doi.org/2002-JCM-8950
Journal of Computational Mathematics, Vol. 20 (2002), Iss. 6 : pp. 653–672
Published online: 2002-01
AMS Subject Headings:
Copyright: COPYRIGHT: © Global Science Press
Pages: 20
Keywords: HFEM arch superconvergence asymptotic exactness posteriori error estimator.