Numerical Investigations on Several Stabilized Finite Element Methods for the Stokes Eigenvalue Problem
作者: Pengzhan Huang , Yinnian He , Xinlong Feng
DOI: 10.1155/2011/745908
关键词: Gauss 、 Mixed finite element method 、 Finite element method 、 Extended finite element method 、 Mathematics 、 Geometry 、 Eigenvalues and eigenvectors 、 Applied mathematics 、 Stability (probability)
摘要: Several stabilized finite element methods for the Stokes eigenvalue problem based on lowest equal-order pair are numerically investigated. They penalty, regular, multiscale enrichment, and local Gauss integration method. Comparisons between them carried out, which show that method has good stability, efficiency, accuracy properties, it is a favorite among these problem.
hindawi.com
core.ac.uk参考文章(25)
Lin Qun, Fourth order eigenvalue approximation by extrapolation on domains with reentrant corners Numerische Mathematik. ,vol. 58, pp. 631- 640 ,(1990) , 10.1007/BF01385645
Jean Roberts, Jean-Marie Thomas, Mixed and hybrid finite element methods Springer-Verlag. ,(1991) , 10.1007/978-1-4612-3172-1
Rodolfo Araya, Gabriel R. Barrenechea, Frédéric Valentin, Stabilized Finite Element Methods Based on Multiscale Enrichment for the Stokes Problem SIAM Journal on Numerical Analysis. ,vol. 44, pp. 322- 348 ,(2006) , 10.1137/050623176
Jian Li, Zhangxin Chen, A new local stabilized nonconforming finite element method for the Stokes equations Computing. ,vol. 82, pp. 157- 170 ,(2008) , 10.1007/S00607-008-0001-Z
I. Babuška, J. E. Osborn, Finite element-galerkin approximation of the eigenvalues and Eigenvectors of selfadjoint problems Mathematics of Computation. ,vol. 52, pp. 275- 297 ,(1989) , 10.1090/S0025-5718-1989-0962210-8
Hongtao Chen, Shanghui Jia, Hehu Xie, Postprocessing and higher order convergence for the mixed finite element approximations of the eigenvalue problem Applied Numerical Mathematics. ,vol. 61, pp. 615- 629 ,(2011) , 10.1016/J.APNUM.2010.12.007
Shanghui Jia, Hehu Xie, Xiaobo Yin, Shaoqin Gao, Approximation and eigenvalue extrapolation of Stokes eigenvalue problem by nonconforming finite element methods Applications of Mathematics. ,vol. 54, pp. 1- 15 ,(2009) , 10.1007/S10492-009-0001-0
Wei Chen, Qun Lin, Approximation of an Eigenvalue Problem Associated with the Stokes Problem by the Stream Function-Vorticity-Pressure Method Applications of Mathematics. ,vol. 51, pp. 73- 88 ,(2006) , 10.1007/S10492-006-0006-X
Jian Li, Yinnian He, Zhangxin Chen, Performance of several stabilized finite element methods for the Stokes equations based on the lowest equal-order pairs Computing. ,vol. 86, pp. 1- 15 ,(2009) , 10.1007/S00607-009-0064-5
J. Rappaz, J. Osborn, B. Mercier, P.-A. Raviart, Eigenvalue approximation by mixed and hybrid methods Mathematics of Computation. ,vol. 36, pp. 427- 453 ,(1981) , 10.2307/2007651