The three-dimensional XY universality class: A high precision Monte Carlo estimate of the universal amplitude ratio A_+/A_-

TL;DR

This paper provides a high-precision Monte Carlo estimate of the universal amplitude ratio A_+/A_- in the three-dimensional XY universality class, crucial for understanding critical phenomena in phase transitions.

Contribution

The study offers the most accurate Monte Carlo simulation results for the amplitude ratio A_+/A_- in the 3D XY model, refining previous estimates and enhancing understanding of critical behavior.

Findings

Estimated R_{α} = 4.01(5) for the amplitude ratio.

Achieved simulations close to critical temperature with high lattice sizes.

Combined new data with previous estimates for improved accuracy.

Abstract

We simulate the improved three-dimensional two-component phi^4 model on the simple cubic lattice in the low and the high temperature phase for reduced temperatures down to |T-T_c|/T_c \approx 0.0017 on lattices of a size up to 350^3. Our new results for the internal energy and the specific heat are combined with the accurate estimates of beta_c and data for the internal energy and the specific heat at \beta_c recently obtained in cond-mat/0605083. We find R_{\alpha} = (1-A_+/A_-)/\alpha = 4.01(5), where alpha is the critical exponent of the specific heat and A_{\pm} is the amplitude of the specific heat in the high and the low temperature phase, respectively.