Litcius/Paper detail

Testing wave turbulence theory for the Gross-Pitaevskii system

Ying Zhu, Б. В. Семисалов, Giorgio Krstulovic, Sergey Nazarenko

2022Physical review. E25 citationsDOIOpen Access PDF

Abstract

We test the predictions of the theory of weak wave turbulence by performing numerical simulations of the Gross-Pitaevskii equation (GPE) and the associated wave-kinetic equation (WKE). We consider an initial state localized in Fourier space, and we confront the solutions of the WKE obtained numerically with GPE data for both the wave-action spectrum and the probability density functions (PDFs) of the Fourier mode intensities. We find that the temporal evolution of the GPE data is accurately predicted by the WKE, with no adjustable parameters, for about two nonlinear kinetic times. Qualitative agreement between the GPE and the WKE persists also for longer times with some quantitative deviations that may be attributed to the combination of a breakdown of the theoretical assumptions underlying the WKE as well as numerical issues. Furthermore, we study how the wave statistics evolves toward Gaussianity in a timescale of the order of the kinetic time. The excellent agreement between direct numerical simulations of the GPE and the WKE provides a solid foundation to the theory of weak wave turbulence.

Topics & Concepts

TurbulenceWave turbulenceNonlinear systemPhysicsStatistical physicsGross–Pitaevskii equationKinetic energyK-omega turbulence modelClassical mechanicsK-epsilon turbulence modelMechanicsQuantum mechanicsCold Atom Physics and Bose-Einstein CondensatesNonlinear Photonic SystemsSpectroscopy and Laser Applications