Please use this identifier to cite or link to this item: http://hdl.handle.net/11455/69351
標題: Symmetry reductions and a posteriori finite element error estimators for bifurcation problems
作者: Chien, C.S.
Jeng, B.W.
關鍵字: nonlinear eigenvalue problems
continuation methods
multigrid methods
finite element method
finite difference method
two-grid schemes
preconditioned Lanczos method
boundary-value-problems
partial-differential-equations
elliptic-equations
continuation
branches
期刊/報告no:: International Journal of Bifurcation and Chaos, Volume 15, Issue 7, Page(s) 2091-2107.
摘要: We discuss efficient continuation algorithms for solving nonlinear eigenvalue problems. First, we exploit the idea of symmetry reductions and discretize the problem on a symmetry cell by the finite element method. Then we incorporate the multigrid V-cycle scheme in the context of continuation method to trace solution branches of the discrete problems, where the preconditioned Lanczos method is used as the relaxation scheme. Next, we apply the symmetry reduction technique to the two-grid finite element discretization scheme [Chien & Jeng, 2005] to solve some nonlinear eigenvalue problems in physical science. The two-grid centered difference discretization scheme described therein was also implemented for comparison. Sample numerical results are reported.
URI: http://hdl.handle.net/11455/69351
ISSN: 0218-1274
文章連結: http://dx.doi.org/10.1142/s0218127405013319
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