GREEN'S FUNCTION IN MAXWELL EQUATIONS FOR HETEROGENEOUS MEDIA (in Russian)
Abstract
Integral equations for describing all points of an electromagnetic field in the presence of finite or infinite dielectric bodies with arbitrary dielectric and magnetic penetrability tensors are developed. An analysis is made of the physical aspect of integral components for points inside and outside a dielectric body. Analogous equations were derived for the two-dimensional case. These integral equations are applied in solutions of various physical problems. It is shown that an anisotropic dielectric ellipsoid and anisotropic eiliptical cylinder are singular convex bodies with homogeneous intrinsic fields in an external homogeneous field. An electro static field exciting a uniform field in an anisotropic dielectric prism is found, and the problems on electromagnetic wave scattering on small anisotropic dielectric bodies and thin anisotroplc dielectric rods are investigated. Scattering of electromagmetic waves on small anisotropic ellipsoids was analyzed as an example. (R.V.J.)
- Authors:
- Publication Date:
- Research Org.:
- Inst. of Physics and Tech., Kharkov
- OSTI Identifier:
- 4842476
- NSA Number:
- NSA-15-022910
- Resource Type:
- Journal Article
- Journal Name:
- Zhur. Tekh. Fiz.
- Additional Journal Information:
- Journal Volume: Vol: 28; Other Information: Orig. Receipt Date: 31-DEC-61
- Country of Publication:
- Country unknown/Code not available
- Language:
- Russian
- Subject:
- PHYSICS
Citation Formats
Khizhnyak, N A. GREEN'S FUNCTION IN MAXWELL EQUATIONS FOR HETEROGENEOUS MEDIA. Country unknown/Code not available: N. p., 1958.
Web.
Khizhnyak, N A. GREEN'S FUNCTION IN MAXWELL EQUATIONS FOR HETEROGENEOUS MEDIA. Country unknown/Code not available.
Khizhnyak, N A. 1958.
"GREEN'S FUNCTION IN MAXWELL EQUATIONS FOR HETEROGENEOUS MEDIA". Country unknown/Code not available.
@article{osti_4842476,
title = {GREEN'S FUNCTION IN MAXWELL EQUATIONS FOR HETEROGENEOUS MEDIA},
author = {Khizhnyak, N A},
abstractNote = {Integral equations for describing all points of an electromagnetic field in the presence of finite or infinite dielectric bodies with arbitrary dielectric and magnetic penetrability tensors are developed. An analysis is made of the physical aspect of integral components for points inside and outside a dielectric body. Analogous equations were derived for the two-dimensional case. These integral equations are applied in solutions of various physical problems. It is shown that an anisotropic dielectric ellipsoid and anisotropic eiliptical cylinder are singular convex bodies with homogeneous intrinsic fields in an external homogeneous field. An electro static field exciting a uniform field in an anisotropic dielectric prism is found, and the problems on electromagnetic wave scattering on small anisotropic dielectric bodies and thin anisotroplc dielectric rods are investigated. Scattering of electromagmetic waves on small anisotropic ellipsoids was analyzed as an example. (R.V.J.)},
doi = {},
url = {https://www.osti.gov/biblio/4842476},
journal = {Zhur. Tekh. Fiz.},
number = ,
volume = Vol: 28,
place = {Country unknown/Code not available},
year = {1958},
month = {1}
}