V. N. Serkin scite author profile

Novel soliton solutions for the nonautonomous nonlinear Schrödinger equation models with linear and harmonic oscillator potentials substantially extend the concept of classical solitons and generalize it to the plethora of nonautonomous solitons that interact elastically and generally move with varying amplitudes, speeds, and spectra adapted both to the external potentials and to the dispersion and nonlinearity variations. The nonautonomous soliton concept can be applied to different physical systems, from hydrodynamics and plasma physics to nonlinear optics and matter waves, and offer many opportunities for further scientific studies.

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Novel Soliton Solutions of the Nonlinear Schrödinger Equation Model

Serkin

Hasegawa²

2000

Phys. Rev. Lett.

723

358

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The methodology developed provides for a systematic way to find an infinite number of the novel stable bright and dark "soliton islands" in a "sea of solitary waves" of the nonlinear Schrodinger equation model with varying dispersion, nonlinearity, and gain or absorption. It is shown that solitons exist only under certain conditions and the parameter functions describing dispersion, nonlinearity, and gain or absorption inhomogeneities cannot be chosen independently. Fundamental soliton management regimes are discovered.

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Stimulated Raman conversion of multisoliton pulses in silica fibers

Dianov¹,

Karasik²,

Mamyshev³

et al. 1986

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Nonautonomous matter-wave solitons near the Feshbach resonance

Hasegawa²,

2010

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Exactly integrable nonlinear Schrodinger equation models with varying dispersion, nonlinearity and gain: application for soliton dispersion

Serkin

Hasegawa²

2002

IEEE J. Select. Topics Quantum Electron.

293

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V. N. Serkin

Nonautonomous Solitons in External Potentials

Novel Soliton Solutions of the Nonlinear Schrödinger Equation Model

Stimulated Raman conversion of multisoliton pulses in silica fibers

Nonautonomous matter-wave solitons near the Feshbach resonance

Exactly integrable nonlinear Schrodinger equation models with varying dispersion, nonlinearity and gain: application for soliton dispersion

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