Equation of state for random sphere packing with arbitrary adhesion and friction

Abstract

We systematically generate a large set of random micro-particle packings over a wide range of adhesion and friction by means of adhesive contact dynamics simulation. The ensemble of generated packings covers a range of volume fraction φ from 0.135 0.007 to 0.639 0.004, and of coordination number Z from 2.11 0.03 to 6.40 0.06. We determine φ and Z at four limits (random close packing, random loose packing, adhesive close packing, and adhesive loose packing), and find a universal equation of state φ(Z) to describe packings with arbitrary adhesion and friction. From a mechanical equilibrium analysis, we determine a critical friction coefficient μ f, c: when the friction coefficient μ f is below μ f, c, particles' rearrangements are dominated by sliding, otherwise, they are dominated by rolling. Because of this reason, both φ(μ f) and Z(μ f) change sharply across μ f, c. Finally, we generalize the Maxwell counting argument to micro-particle packings, and show that the loosest packing, i.e., adhesive loose packing, satisfies the isostatic condition at Z=2.