Exact Energy Computation of the One Component Plasma on a Sphere for Even Values of the Coupling Parameter

Abstract

The two dimensional one component plasma 2dOCP is a classical system consisting of N identical particles with the same charge q confined in a two dimensional surface with a neutralizing background. The Boltzmann factor at temperature T may be expressed as a Vandermonde determinant to the power =q2/(kB T). Several statistical properties of the 2dOCP have been studied by expanding the Boltzmann factor in the monomial basis for even values of . In this work, we use this formalism to compute the energy of the 2dOCP on a sphere. Using the same approach the entropy is computed. The entropy as well as the free energy in the thermodynamic limit have a universal finite-size correction term 12 N, where =2 is the Euler characteristic of the sphere. A non-recursive formula for coefficients of monomial functions expansion is used for exploring the energy as well as structural properties for sufficiently large values of to appreciate the crystallization features for N=2,3,…,9 particles. Finally, we make a brief comparison between the exact and numerical energies obtained with the Metropolis method for even values of .