Abstract

© 2016 Sociedad Matemática Mexicana. In the present work, we consider an isotropic planarly layered waveguide in the case of polarized waves, and calculate the Green's function associated with a motionless unit point source in the stationary state. Onthe basis of the Green's function, we approach the dynamical problem of a point source that is in uniform motion in the waveguide. The mathematical description of the transverse electric and transverse magnetic waves generated by the moving point source is given in the form of double oscillatory integrals of the time and the frequency. Then these integrals are written in terms of a large parameter λ > 0 in order to apply the stationary phase method. This gives asymptotic formulas for the electromagnetic field as λ → ∞. The calculation of the stationary points of the phase leads us to the condition that guarantees the existence of Cherenkov radiation in thewaveguide. Finally, the analysis here presented is applied to some numerical examples,which areworkedwith an algorithm based on the spectral parameter power series method.
Original languageAmerican English
Pages (from-to)431-459
Number of pages385
JournalBoletin de la Sociedad Matematica Mexicana
DOIs
StatePublished - 1 Jan 2016

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Point Source
Green's function
point source
Waveguide
Waveguides
Radiation
Green function
Transverse
Electromagnetic fields
Double integral
Oscillatory Integrals
Stationary Phase
Stationary point
electromagnetic field
Stationary States
Asymptotic Formula
Power series
Electromagnetic Fields
Calculate
Numerical Examples

Cite this

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title = "Cherenkov radiation in a planarly layered waveguide in the case of polarized waves",
abstract = "{\circledC} 2016 Sociedad Matem{\'a}tica Mexicana. In the present work, we consider an isotropic planarly layered waveguide in the case of polarized waves, and calculate the Green's function associated with a motionless unit point source in the stationary state. Onthe basis of the Green's function, we approach the dynamical problem of a point source that is in uniform motion in the waveguide. The mathematical description of the transverse electric and transverse magnetic waves generated by the moving point source is given in the form of double oscillatory integrals of the time and the frequency. Then these integrals are written in terms of a large parameter λ > 0 in order to apply the stationary phase method. This gives asymptotic formulas for the electromagnetic field as λ → ∞. The calculation of the stationary points of the phase leads us to the condition that guarantees the existence of Cherenkov radiation in thewaveguide. Finally, the analysis here presented is applied to some numerical examples,which areworkedwith an algorithm based on the spectral parameter power series method.",
author = "V{\'i}ctor Barrera-Figueroa and Rabinovich, {Vladimir S.}",
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AU - Barrera-Figueroa, Víctor

AU - Rabinovich, Vladimir S.

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N2 - © 2016 Sociedad Matemática Mexicana. In the present work, we consider an isotropic planarly layered waveguide in the case of polarized waves, and calculate the Green's function associated with a motionless unit point source in the stationary state. Onthe basis of the Green's function, we approach the dynamical problem of a point source that is in uniform motion in the waveguide. The mathematical description of the transverse electric and transverse magnetic waves generated by the moving point source is given in the form of double oscillatory integrals of the time and the frequency. Then these integrals are written in terms of a large parameter λ > 0 in order to apply the stationary phase method. This gives asymptotic formulas for the electromagnetic field as λ → ∞. The calculation of the stationary points of the phase leads us to the condition that guarantees the existence of Cherenkov radiation in thewaveguide. Finally, the analysis here presented is applied to some numerical examples,which areworkedwith an algorithm based on the spectral parameter power series method.

AB - © 2016 Sociedad Matemática Mexicana. In the present work, we consider an isotropic planarly layered waveguide in the case of polarized waves, and calculate the Green's function associated with a motionless unit point source in the stationary state. Onthe basis of the Green's function, we approach the dynamical problem of a point source that is in uniform motion in the waveguide. The mathematical description of the transverse electric and transverse magnetic waves generated by the moving point source is given in the form of double oscillatory integrals of the time and the frequency. Then these integrals are written in terms of a large parameter λ > 0 in order to apply the stationary phase method. This gives asymptotic formulas for the electromagnetic field as λ → ∞. The calculation of the stationary points of the phase leads us to the condition that guarantees the existence of Cherenkov radiation in thewaveguide. Finally, the analysis here presented is applied to some numerical examples,which areworkedwith an algorithm based on the spectral parameter power series method.

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