Hydrodynamic tails and a fluctuation bound on the bulk viscosity

Abstract

We study the small frequency behavior of the bulk viscosity spectral function using stochastic fluid dynamics. We obtain a number of model independent results, including the long-time tail of the bulk stress correlation function, and the leading non-analyticity of the spectral function at small frequency. We also establish a lower bound on the bulk viscosity which is weakly dependent on assumptions regarding the range of applicability of fluid dynamics. The bound on the bulk viscosity ζ scales as ζ min (P-23 E)2 Σi Di-2, where Di are the diffusion constants for energy and momentum, and P-23 E, where P is the pressure and E is the energy density, is a measure of scale breaking. Applied to the cold Fermi gas near unitarity, |λ/as|≥ 1 where λ is the thermal de Broglie wave length and as is the s-wave scattering length, this bound implies that the ratio of bulk viscosity to entropy density satisfies ζ/s ≥ 0.1/kB. Here, is Planck's constant and kB is Boltzmann's constant.