An irregular grid for the numerical solution of linear elliptic partial differential equations
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摘要
This paper first presents a symmetrically geometric proportion grid with respect to the boundary for linear elliptic partial differential equations with the homogeneous Dirichlet conditions. Then a symmetric scaling technique is proposed for the coefficient matrix derived from the second-order centered difference discretization on the irregular grid. It is proved that the condition number of the symmetrically scaled system is bounded by a constant independent of the matrix order for one-dimensional problem. The numerical results also indicate that the same conclusion holds for a two-dimensional problem.
论文关键词:Irregular grid,Elliptic PDEs,Condition number,CG
论文评审过程:Available online 17 November 2004.
论文官网地址:https://doi.org/10.1016/j.amc.2004.04.055