Critical exponents of the three-dimensional classical plane-rotator model on the sc lattice from a high-temperature-series analysis

1 November 1993

journal article
research article
Published by American Physical Society (APS) in Physical Review B

Vol. 48 (18) , 13987-13990
https://doi.org/10.1103/physrevb.48.13987

Abstract

High-temperature-series expansions of the spin-spin correlation function for the plane-rotator (or XY) model on the sc lattice are extended by three terms through order

β^{17}

. Tables of the expansion coefficients are reported for the correlation function spherical moments of order l=0,1,2. Our analysis of the series leads to fairly accurate estimates of the critical parameters.

All Related Versions

Version 1, 1993-05-03, ArXiv

This publication has 40 references indexed in Scilit:

Quantitative study of the Kosterlitz-Thouless phase transition in anXYmodel of two-dimensional plane rotators: High-temperature expansions to order $β^{20}$
Physical Review B, 1993
Superfluid fraction of ${}^{4}{He}$ very close to $T_{λ}$
Physical Review B, 1992
ClassicalO(N) Heisenberg model: Extended high-temperature series for two, three, and four dimensions
Physical Review B, 1990
Critical exponents of the 3D XY model from cluster update Monte Carlo
Physics Letters B, 1990
Critical behavior of the two-dimensionalXYmodel: An analysis of extended high-temperature series
Physical Review B, 1989
High temperature expansion via Schwinger-Dyson equations: The planar rotator model on a triangular lattice
Computer Physics Communications, 1987
Massless phases and symmetry restoration in abelian gauge theories and spin systems
Communications in Mathematical Physics, 1982
Critical exponents from field theory
Physical Review B, 1980
Phase transitions and reflection positivity. I. General theory and long range lattice models
Communications in Mathematical Physics, 1978
Theory of dynamic critical phenomena
Reviews of Modern Physics, 1977