Does the Chapman--Enskog expansion for sheared granular gases converge?
arXiv:0711.3115 · doi:10.1103/PhysRevLett.100.078003
Abstract
The fundamental question addressed in this paper is whether the partial Chapman--Enskog expansion $P_{xy}=-\sum_{k=0}^\infty η_k ({\partial u_x}/{\partial y})^{2k+1}$ of the shear stress converges or not for a gas of inelastic hard spheres. By using a simple kinetic model it is shown that, in contrast to the elastic case, the above series does converge, the radius of convergence increasing with inelasticity. It is argued that this paradoxical conclusion is not an artifact of the kinetic model and can be understood in terms of the time evolution of the scaled shear rate in the uniform shear flow.
4 pages, 1 table, 2 figures; v2: minor changes,Fig. 2 redone