Correlation energy of the one-dimensional Coulomb gas

Abstract

We introduce a new paradigm for finite and infinite strict-one-dimensional uniform electron gases. In this model, n electrons are confined to a ring and interact via a bare Coulomb operator. In the high-density limit (small-rs, where rs is the Seitz radius), we find that the reduced correlation energy is (rs,n) = (2)(n) + O(rs), and we report explicit expressions for (2)(n). In the thermodynamic (large-n) limit of this, we show that (rs) = - π2/360 + O(rs). In the low-density (large-rs) limit, the system forms a Wigner crystal and we find that (rs) = -[(2π)-3/4] rs-1 + 0.359933 rs-3/2 + O(rs-2). Using these results, we propose a correlation functional that interpolates between the high- and low-density limits. The accuracy of the functional for intermediate densities is established by comparison with diffusion Monte Carlo results. Application to a non-uniform system is also reported.