Collision statistics in sheared inelastic hard spheres

TL;DR

This study investigates the behavior of sheared inelastic hard spheres using simulations, revealing anisotropic velocity distributions, collision dynamics, and the applicability of kinetic models under various conditions.

Contribution

It provides detailed simulation data and comparisons with kinetic models, enhancing understanding of collision statistics in sheared inelastic particle systems.

Findings

Velocity distribution is anisotropic and well approximated by an anisotropic Gaussian.

Collision rates and distributions depend on density and inelasticity.

Good agreement with kinetic models for high density and weak inelasticity.

Abstract

The dynamics of sheared inelastic-hard-sphere systems are studied using non-equilibrium molecular dynamics simulations and direct simulation Monte Carlo. In the molecular dynamics simulations Lees-Edwards boundary conditions are used to impose the shear. The dimensions of the simulation box are chosen to ensure that the systems are homogeneous and that the shear is applied uniformly. Various system properties are monitored, including the one-particle velocity distribution, granular temperature, stress tensor, collision rates, and time between collisions. The one-particle velocity distribution is found to agree reasonably well with an anisotropic Gaussian distribution, with only a slight overpopulation of the high velocity tails. The velocity distribution is strongly anisotropic, especially at lower densities and lower values of the coefficient of restitution, with the largest variance in the direction of shear. The density dependence of the compressibility factor of the sheared inelastic hard sphere system is quite similar to that of elastic hard sphere fluids. As the systems become more inelastic, the glancing collisions begin to dominate more direct, head-on collisions. Examination of the distribution of the time between collisions indicates that the collisions experienced by the particles are strongly correlated in the highly inelastic systems. A comparison of the simulation data is made with DSMC simulation of the Enskog equation. Results of the kinetic model of Montanero et al. {[}Montanero et al., J. Fluid Mech. 389, 391 (1999){]} based on the Enskog equation are also included. In general, good agreement is found for high density, weakly inelastic systems.