English

Second-order (2+1)-dimensional anisotropic hydrodynamics

Nuclear Theory 2014-11-26 v2 High Energy Physics - Phenomenology

Abstract

We present a complete formulation of second-order (2+1)-dimensional anisotropic hydrodynamics. The resulting framework generalizes leading-order anisotropic hydrodynamics by allowing for deviations of the one-particle distribution function from the spheroidal form assumed at leading order. We derive complete second-order equations of motion for the additional terms in the macroscopic currents generated by these deviations from their kinetic definition using a Grad-Israel-Stewart 14-moment ansatz. The result is a set of coupled partial differential equations for the momentum-space anisotropy parameter, effective temperature, the transverse components of the fluid four-velocity, and the viscous tensor components generated by deviations of the distribution from spheroidal form. We then perform a quantitative test of our approach by applying it to the case of one-dimensional boost-invariant expansion in the relaxation time approximation (RTA) in which case it is possible to numerically solve the Boltzmann equation exactly. We demonstrate that the second-order anisotropic hydrodynamics approach provides an excellent approximation to the exact (0+1)-dimensional RTA solution for both small and large values of the shear viscosity.

Keywords

Cite

@article{arxiv.1311.6720,
  title  = {Second-order (2+1)-dimensional anisotropic hydrodynamics},
  author = {Dennis Bazow and Ulrich W. Heinz and Michael Strickland},
  journal= {arXiv preprint arXiv:1311.6720},
  year   = {2014}
}

Comments

52 pages, 4 figures. Chapter 6 was completely rewritten, no qualitative changes in the results

R2 v1 2026-06-22T02:15:16.068Z