Shear flows in far-from-equilibrium strongly coupled fluids

Despite the viscosity of a fluid ranges over several orders of magnitudes and is extremely sensitive to microscopic structure and molecular interactions, it has been conjectured that its (opportunely normalized) minimum displays a universal value which is experimentally approached in strongly couple...

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Bibliographic Details
Published in:arXiv.org 2022-06
Main Authors: Baggioli, Matteo, Li, Li, Hao-Tian, Sun
Format: Article
Language:English
Subjects:
Deformation
Density ratio
Energy dissipation
Entropy
Equilibrium
Fluid mechanics
Flux density
Gluons
Hydrodynamics
Initial conditions
Molecular interactions
Molecular structure
Quark-gluon plasma
Shear flow
Time dependence
Transport properties
Viscosity
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Summary:Despite the viscosity of a fluid ranges over several orders of magnitudes and is extremely sensitive to microscopic structure and molecular interactions, it has been conjectured that its (opportunely normalized) minimum displays a universal value which is experimentally approached in strongly coupled fluids such as the quark-gluon plasma. At the same time, recent findings suggest that hydrodynamics could serve as a universal attractor even when the deformation gradients are large and that dissipative transport coefficients, such as viscosity, could still display a universal behavior far-from-equilibrium. Motivated by these observations, we consider the real-time dissipative dynamics of several holographic models under large shear deformations. In all the cases considered, we observe that at late time both the viscosity-entropy density ratio and the dimensionless ratio between energy density and entropy density approach a constant value. Whenever the shear rate in units of the energy density is small at late time, these values coincide with the expectations from near equilibrium hydrodynamics. Surprisingly, even when this is not the case, and the system at late time is far from equilibrium, the viscosity-to-entropy ratio approaches a constant which decreases monotonically with the dimensionless shear rate and can be parametrically smaller than the hydrodynamic result.
ISSN:2331-8422
DOI:10.48550/arxiv.2112.14855