Gaussian core model phase diagram and pair correlations in high Euclidean dimensions

TL;DR

This paper investigates the phase diagram and pair correlations of the Gaussian core model in high Euclidean dimensions, using analytical and numerical methods to explore fluid and solid phases and their transitions.

Contribution

It extends the understanding of the Gaussian core model's behavior to arbitrary high dimensions, providing analytical cluster expansions and phase coexistence insights.

Findings

Cluster expansion of the pair correlation function in dilute regimes.

Evidence supporting a decorrelation principle in high dimensions.

Analysis of phase coexistence and ground-state structures across dimensions.

Abstract

The physical properties of a classical many-particle system with interactions given by a repulsive Gaussian pair potential are extended to arbitrarily high Euclidean dimensions. The goals of this paper are to characterize the behavior of the pair correlation function (pcf) in various density regimes and to understand the phase properties of the Gaussian core model (GCM) as parametrized by dimension d. To this end, we explore the fluid and crystalline solid phases. For the dilute regime of the fluid phase, a cluster expansion of the pcf in reciprocal temperature is presented, the coefficients of which may be evaluated analytically due to the nature of the Gaussian potential. We present preliminary results concerning the convergence properties of this expansion. The analytical cluster expansion is related to numerical approximations for the pcf in the dense fluid regime by utilizing hypernetted chain, Percus-Yevick, and mean-field closures to the Ornstein-Zernike equation. Based on the results of these comparisons, we provide evidence in support of a decorrelation principle for the GCM in high Euclidean dimensions. In the solid phase, we consider the behavior of the freezing temperature in the limit of zero density and show that it approaches zero itself in this limit for any d via a collective coordinate argument. Duality relations with respect to the energies of a lattice and its dual are then discussed, and these relations aid in the Maxwell double-tangent construction of phase coexistence regions between dual lattices based on lattice summation energies. The results from this analysis are used to draw conclusions about the ground-state structures of the GCM for a given dimension.