Density-scaling exponents and virial potential-energy correlation coefficients for the (2n,n) Lennard-Jones system

Abstract

This paper investigates the relation between the density-scaling exponent γ and the virial potential-energy correlation coefficient R at several thermodynamic state points in three dimensions for the generalized (2n,n) Lennard-Jones (LJ) system for n=4, 9, 12, 18, as well as for the standard n=6 LJ system in two, three, and four dimensions. The state points studied include many low-density states at which the virial potential-energy correlations are not strong. For these state points we find the roughly linear relation γ 3nR/d in d dimensions. This result is discussed in light of the approximate "extended inverse power law" description of generalized LJ potentials [N. P. Bailey et al., J. Chem. Phys. 129, 184508 (2008)]. In the plot of γ versus R there is in all cases a transition around R≈ 0.9, above which γ starts to decrease as R approaches unity. This is consistent with the fact that γ→ 2n/d for R→ 1, a limit that is approached at high densities and/or temperatures at which the repulsive r-2n term dominates the physics.