An Efficient Newton Multiscale Multigrid Method for 2D Semilinear Poisson Equations

Authors

Ming Li
Zhoushun Zheng
Kejia Pan
Xiaoqiang Yue

DOI:

https://doi.org/10.4208/eajam.090120.260320

Keywords:

Semilinear Poisson equation, Richardson extrapolation, sixth-order accuracy, Newton’s method, multiscale multigrid.

Abstract

An efficient Newton multiscale multigrid (Newton-MSMG) for solving large nonlinear systems arising in the fourth-order compact difference discretisation of 2D semilinear Poisson equations is presented. The Newton-MG method is employed to calculate approximation solutions on coarse and fine grids and then a completed Richardson extrapolation is used to construct a sixth-order extrapolated solution on the entire fine grid directly. The method is applied to two nonlinear Poisson-Boltzmann equations and numerical simulations show that the Newton-MSMG method is a cost-effective approach with the sixth-order accuracy.

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Published

2020-06-12

Issue

Vol. 10 No. 3 (2020)

Section

Articles