High-Order Hydrodynamics from Boltzmann-BGK

Abstract

In this work, closure of the Boltzmann--BGK moment hierarchy is accomplished via projection of the distribution function f onto a space HN spanned by N-order Hermite polynomials. While successive order approximations retain an increasing number of leading-order moments of f, the presented procedure produces a hierarchy of (single) N-order partial-differential equations providing exact analytical description of the hydrodynamics rendered by (N-order) lattice Boltzmann--BGK (LBGK) simulation. Numerical analysis is performed with LBGK models and direct simulation Monte Carlo (DSMC) for the case of a sinusoidal shear wave (Kolmogorov flow) in a wide range of Weissenberg number Wi=τ k2 (i.e. Knudsen number Kn=λ k=Wi); k is the wavenumber, τ the relaxation time of the system, λτ cs the mean-free path, and cs the speed of sound. The present results elucidate the applicability of LBGK simulation under general non-equilibrium conditions.