English

Relations Among Two Methods for Computing the Partition Function of the Two-Dimensional One-Component Plasma

Statistical Mechanics 2016-05-09 v1

Abstract

The two-dimensional one-component plasma ---2dOCP--- is a system composed by nn mobile particles with charge qq over a neutralizing background in a two-dimensional surface. The Boltzmann factor of this system, at temperature TT, takes the form of a Vandermonde determinant to the power Γ=q2/(2πεkBT)\Gamma = q^2/(2\pi\varepsilon k_BT), where Γ\Gamma is the coupling constant of this Coulomb system. The partition function of the model has been computed exactly for the even values of the coupling constant Γ\Gamma, and a finite number of particles nn, by two means: 1) by recognizing that the Boltzmann factor is the square of a Jack polynomial and expanding it in an appropriate monomial base, and 2) by mapping the system onto a 1-dimensional chain of interacting fermions. In this work the connection among the two methods is derived, and some properties of the expansion coefficients for the power of the Vandermonde determinant are explored.

Keywords

Cite

@article{arxiv.1503.06248,
  title  = {Relations Among Two Methods for Computing the Partition Function of the Two-Dimensional One-Component Plasma},
  author = {Johnny Alejandro Mora Grimaldo and Gabriel Tellez},
  journal= {arXiv preprint arXiv:1503.06248},
  year   = {2016}
}
R2 v1 2026-06-22T08:58:30.704Z