Consistent dynamics of the components of an elliptically polarised wave with zero mean amplitudes in a nonlinear isotropic gyrotropic medium in the adiabatic approximation
Abstract
The adiabatic approximation is used to obtain an analytical solution to a nonintegrable problem of propagation of a plane elliptically polarised light wave with zero mean amplitudes of orthogonal circularly polarised field components through an isotropic gyrotropic medium with local and nonlocal components of Kerr nonlinearity and second-order group velocity dispersion. We describe the aperiodic evolution of bound (attributable to the medium nonlinearity) paired states, which are responsible for the propagation of two orthogonal polarisation components – cnoidal waves with significantly different periods. (nonlinear optical phenomena)
- Authors:
-
- International Laser Center, M. V. Lomonosov Moscow State University, Moscow (Russian Federation)
- Publication Date:
- OSTI Identifier:
- 22395791
- Resource Type:
- Journal Article
- Journal Name:
- Quantum Electronics (Woodbury, N.Y.)
- Additional Journal Information:
- Journal Volume: 45; Journal Issue: 1; Other Information: Country of input: International Atomic Energy Agency (IAEA); Journal ID: ISSN 1063-7818
- Country of Publication:
- United States
- Language:
- English
- Subject:
- 71 CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS; 72 PHYSICS OF ELEMENTARY PARTICLES AND FIELDS; ADIABATIC APPROXIMATION; ANALYTICAL SOLUTION; DISPERSION RELATIONS; NONLINEAR PROBLEMS; POLARIZATION; VELOCITY; VISIBLE RADIATION; WAVE PROPAGATION
Citation Formats
Makarov, V A, Petnikova, V M, Rudenko, K V, and Shuvalov, V V. Consistent dynamics of the components of an elliptically polarised wave with zero mean amplitudes in a nonlinear isotropic gyrotropic medium in the adiabatic approximation. United States: N. p., 2015.
Web. doi:10.1070/QE2015V045N01ABEH015572.
Makarov, V A, Petnikova, V M, Rudenko, K V, & Shuvalov, V V. Consistent dynamics of the components of an elliptically polarised wave with zero mean amplitudes in a nonlinear isotropic gyrotropic medium in the adiabatic approximation. United States. https://doi.org/10.1070/QE2015V045N01ABEH015572
Makarov, V A, Petnikova, V M, Rudenko, K V, and Shuvalov, V V. 2015.
"Consistent dynamics of the components of an elliptically polarised wave with zero mean amplitudes in a nonlinear isotropic gyrotropic medium in the adiabatic approximation". United States. https://doi.org/10.1070/QE2015V045N01ABEH015572.
@article{osti_22395791,
title = {Consistent dynamics of the components of an elliptically polarised wave with zero mean amplitudes in a nonlinear isotropic gyrotropic medium in the adiabatic approximation},
author = {Makarov, V A and Petnikova, V M and Rudenko, K V and Shuvalov, V V},
abstractNote = {The adiabatic approximation is used to obtain an analytical solution to a nonintegrable problem of propagation of a plane elliptically polarised light wave with zero mean amplitudes of orthogonal circularly polarised field components through an isotropic gyrotropic medium with local and nonlocal components of Kerr nonlinearity and second-order group velocity dispersion. We describe the aperiodic evolution of bound (attributable to the medium nonlinearity) paired states, which are responsible for the propagation of two orthogonal polarisation components – cnoidal waves with significantly different periods. (nonlinear optical phenomena)},
doi = {10.1070/QE2015V045N01ABEH015572},
url = {https://www.osti.gov/biblio/22395791},
journal = {Quantum Electronics (Woodbury, N.Y.)},
issn = {1063-7818},
number = 1,
volume = 45,
place = {United States},
year = {Sat Jan 31 00:00:00 EST 2015},
month = {Sat Jan 31 00:00:00 EST 2015}
}
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