A quantitative study of the Kosterlitz-Thouless phase transition in a system of two-dimensional plane rotators ( XY model ) by high temperature expansions through $\beta^{20}$

TL;DR

This paper extends high temperature series expansions of the XY model to order β^{20}, providing detailed coefficients and supporting the Kosterlitz-Thouless theory with improved estimates of critical parameters.

Contribution

It presents extended series expansions up to order β^{20} for the XY model, including correlation functions and vorticity, and analyzes critical behavior supporting Kosterlitz-Thouless predictions.

Findings

Series expansions extended to β^{20}

Coefficients support Kosterlitz-Thouless critical singularities

Provides accurate estimates of critical parameters

Abstract

High temperature series expansions of the spin-spin correlation function for the plane rotator (or XY) model on the square lattice are extended by three terms through order $\beta^{20}$. Tables of the expansion coefficients are reported for the correlation function spherical moments of order $l=0,1,2$. The expansion coefficients through $\beta^{15}$ for the vorticity are also tabulated. Our analysis of the series supports the Kosterlitz-Thouless predictions on the structure of the critical singularities and leads to fairly accurate estimates of the critical parameters.