Development and Analysis of a New Finite Element Method for the Cohen–Monk PML Model

Authors

Meng Chen, Jiangxi Normal University
Yunqing Huang, Xiangtan University
Jichun Li, University of Nevada, Las VegasFollow

Document Type

Article

Publication Date

1-2-2021

Publication Title

Numerische Mathematik

Volume

147

First page number:

127

Last page number:

155

Abstract

This work deals with the Cohen–Monk Perfectly Matched Layer (PML) model. We first carry out the stability analysis of its equivalent form. Then we propose and analyse a finite element scheme for solving this equivalent PML model. Discrete stability and optimal error estimate are established. Numerical results are presented to justify the analysis and effectiveness of this PML model. This paper presents the first mathematical analysis for this PML model and the corresponding numerical analysis for the proposed finite element scheme.

Disciplines

Applied Mathematics | Mathematics

Language

English

Repository Citation

Chen, M., Huang, Y., Li, J. (2021). Development and Analysis of a New Finite Element Method for the Cohen–Monk PML Model. Numerische Mathematik, 147 127-155.
http://dx.doi.org/10.1007/s00211-020-01166-4