An Optimal Sixth-Order Finite Difference Scheme for the Helmholtz Equation in One-Dimension

Authors

Xu Liu chool of Applied Mathematics, Jilin University of Finance and Economics, Changchun, 130117
Haina Wang School of Applied Mathematics, Jilin University of Finance and Economics, Changchun, 130117
Jing Hu School of Applied Mathematics, Jilin University of Finance and Economics, Changchun, 130117

DOI:

https://doi.org/10.13447/j.1674-5647.2019.03.07

Keywords:

Helmholtz equation, finite difference method, numerical dispersion

Abstract

In this paper, we present an optimal 3-point finite difference scheme for solving the 1D Helmholtz equation. We provide a convergence analysis to show that the scheme is sixth-order in accuracy. Based on minimizing the numerical dispersion, we propose a refined optimization rule for choosing the scheme's weight parameters. Numerical results are presented to demonstrate the efficiency and accuracy of the optimal finite difference scheme.

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Published

2019-12-16

Issue

Vol. 35 No. 3 (2019)

Section

Articles