Evolution of Non-Gaussian Hydrodynamic Fluctuations
Xin An, Gökçe Başar, Mikhail Stephanov, Ho-Ung Yee
Abstract
In the context of the search for the QCD critical point using non-Gaussian fluctuations, we obtain the evolution equations for non-Gaussian cumulants to the leading order of the systematic expansion in the magnitude of thermal fluctuations. We develop a diagrammatic technique in which the leading order contributions are given by tree diagrams. We introduce a Wigner transform for multipoint correlators and derive the evolution equations for three- and four-point Wigner functions for the problem of nonlinear stochastic diffusion with multiplicative noise.
Topics & Concepts
Statistical physicsGaussianMultiplicative functionPhysicsContext (archaeology)Multiplicative noiseCumulantNonlinear systemBispectrumNon-GaussianityDiagrammatic reasoningQuantum mechanicsMathematicsMathematical analysisSpectral densityComputer scienceAnisotropyCosmic microwave backgroundBiologyStatisticsDigital signal processingProgramming languageAnalog signalSignal transfer functionComputer hardwarePaleontologyHigh-Energy Particle Collisions ResearchTheoretical and Computational PhysicsStatistical Mechanics and Entropy