Ekaterina Kuzmina scite author profile

Existence of symmetric complex waves in a dielectric rod (DR)-a dielectric waveguide of circular cross section-is proved by analyzing functional properties of the dispersion equations (DEs) using the theory of functions of several complex variables and validating the existence of complex roots of DE. A closed-form iteration procedure for calculating the roots in the complex domain supplied with efficient choice of initial approximation is proposed. Numerical modeling is performed with the help of a parameter-differentiation method applied to the analytical and numerical solution of DEs.

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Electron density distribution in crystal of polyfluorinated tetraazapentalene based on X-ray diffraction data at 130 K

Antipin

Kuzmina

1995

Russ Chem Bull

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Symmetric surface waves along a metamaterial dielectric waveguide and a perfectly conducting cylinder covered by a metamaterial layer

Shestopalov¹,

Kuzmina²

2018

AEM

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Existence of symmetric complex waves in a metamaterial dielectric rod and a perfectly conducting cylinder of circular cross section covered by a concentric layer of metamaterial, a metamaterial Goubau line, is proved. Analytical investigation and numerical solution of dispersion equations reveal several important properties of running waves inherent to open metal-metamaterial waveguides which have not been reported for waveguides filled with standard media.

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Waves in a lossy Goubau line

Kuzmina¹,

Shestopalov

2016

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