TY - JOUR
T1 - Розвиток інтегрованої турбулентності
AU - Agafontsev, D. S.
AU - Zakharov, V. E.
N1 - Funding Information:
The authors thank A.A. Gelash for fruitful discussions. Simulations were performed at the Novosibirsk Supercomputer Center (NSU). The work of both authors was supported by the Russian Science Foundation Grant No. 19-72-30028. _______
Publisher Copyright:
© D.S. Agafontsev and V.E. Zakharov, 2020
PY - 2020/8
Y1 - 2020/8
N2 - We study numerically the integrable turbulence in the framework of the focusing one-dimensional nonlinear Schrödinger equation using a new method - the “growing of turbulence”. We add to the equation a weak controlled pumping term and start adiabatic evolution of turbulence from statistically homogeneous Gaussian noise. After reaching a certain level of average intensity, we switch off the pumping and realize that the “grown up” turbulence is statistically stationary. We measure its Fourier spectrum, the probability density function (PDF) of intensity and the autocorrelation of intensity. Additionally, we show that, being adiabatic, our method produces stationary states of the integrable turbulence for the intermediate moments of pumping as well. Presently, we consider only the turbulence of relatively small level of nonlinearity; however, even this “moderate” turbulence is characterized by enhanced generation of rogue waves.
AB - We study numerically the integrable turbulence in the framework of the focusing one-dimensional nonlinear Schrödinger equation using a new method - the “growing of turbulence”. We add to the equation a weak controlled pumping term and start adiabatic evolution of turbulence from statistically homogeneous Gaussian noise. After reaching a certain level of average intensity, we switch off the pumping and realize that the “grown up” turbulence is statistically stationary. We measure its Fourier spectrum, the probability density function (PDF) of intensity and the autocorrelation of intensity. Additionally, we show that, being adiabatic, our method produces stationary states of the integrable turbulence for the intermediate moments of pumping as well. Presently, we consider only the turbulence of relatively small level of nonlinearity; however, even this “moderate” turbulence is characterized by enhanced generation of rogue waves.
KW - Integrable turbulence
KW - Nonlinear Schrödinger equation
KW - Pumping
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M3 - Article
AN - SCOPUS:85091629594
SN - 0132-6414
VL - 46
SP - 934
EP - 939
JO - Fizika Nizkikh Temperatur
JF - Fizika Nizkikh Temperatur
IS - 8
ER -