Bicompact Finite-Difference Scheme for Maxwell’s Equations in Layered Media

Abstract: In layered media, the solution of Maxwell’s equations suffers a strong or weak discontinuity at the layer boundaries. Finite-difference schemes providing convergence on strong discontinuities have been proposed for the first time. These are conservative bicompact two-point schemes with mesh nodes lying on the layer boundaries. A fundamentally new technique for taking into account the medium dispersion is proposed. All these features ensure the second order of accuracy of the schemes on discontinuous solutions. Numerical examples illustrating these results are given. © 2020, Pleiades Publishing, Ltd.

Authors

Belov A.A. ^1, ² , Dombrovskaya Z.O.¹

Journal

Doklady Mathematics

Number of issue

Language

English

Pages

185-188

Status

Published

Link

External link

DOI

10.1134/S1064562420020039

Volume

101

Year

2020

Organizations

¹ Faculty of Physics, Lomonosov Moscow State University, Moscow, 119991, Russian Federation
² RUDN University, Moscow, 117198, Russian Federation

Keywords

bicompact schemes; conjugation conditions; layered media; material dispersion; Maxwell’s equations

Date of creation

02.11.2020

Date of change

02.11.2020

Short link

https://repository.rudn.ru/en/records/article/record/64768/

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Article

Rynkovskaya M.

International Journal of Mechanical Engineering and Robotics Research. International Journal of Mechanical Engineering and Robotics Research. Vol. 9. 2020. P. 696-700

MATHEMATICAL MODELING SHOWS THAT THE RESPONSE OF A SOLID TUMOR TO ANTIANGIOGENIC THERAPY DEPENDS ON THE TYPE OF GROWTH

Article

Kuznetsov M.

Mathematics. MDPI AG. Vol. 8. 2020.

Bicompact Finite-Difference Scheme for Maxwell’s Equations in Layered Media

Other records

PRELIMINARY SHAPE DESIGN FOR SCREWS AND HELICAL STRUCTURES

MATHEMATICAL MODELING SHOWS THAT THE RESPONSE OF A SOLID TUMOR TO ANTIANGIOGENIC THERAPY DEPENDS ON THE TYPE OF GROWTH