Problem of the local field for plane grids with bianisotropic particles

Pavel A. Belov; Constantin R. Simovski; Mikhail S. Kondratiev

doi:10.1117/12.276586

13 June 1997 Problem of the local field for plane grids with bianisotropic particles

Pavel A. Belov, Constantin R. Simovski, Mikhail S. Kondratiev

Proceedings Volume 3039, Smart Structures and Materials 1997: Mathematics and Control in Smart Structures; (1997) https://doi.org/10.1117/12.276586
Event: Smart Structures and Materials '97, 1997, San Diego, CA, United States

Abstract

A problem of local field for 2D regular and weakly non- regular arrays of bi-anisotropic particles is considered. Such arrays are excited by an incident plane electromagnetic wave. The local field is formed by incident wave and by all the particles besides an arbitrary chosen particle under consideration which can be named as zero-particle. For infinite or very large arrays we can express the local fields with only tow vector complex values which are to be defined in frames of the separate problem of an exciting and scattering by such grids. But the equations relating electric and magnetic dipole moments of zero-particle with an incident wave field are that we find in this paper. Since these moments can be easily related with the surface density of electric and magnetic moments averaged on the grid surface the equations under consideration are analogues with the known local field formulae in theories of 3D media. Our relations are given by several dyadics which are named below as key dyadics.

Citation Download Citation

Pavel A. Belov, Constantin R. Simovski, and Mikhail S. Kondratiev "Problem of the local field for plane grids with bianisotropic particles", Proc. SPIE 3039, Smart Structures and Materials 1997: Mathematics and Control in Smart Structures, (13 June 1997); https://doi.org/10.1117/12.276586

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