The Nonclassical Regime of the Two-dimensional Long-range XY Model: a Comprehensive Monte Carlo Study

TL;DR

This comprehensive Monte Carlo study explores the phase transitions and critical behavior of the 2D XY model with long-range interactions decaying as 1/r^{2+\sigma}, revealing a crossover at =2 between non-classical and short-range regimes.

Contribution

The paper provides the first detailed numerical analysis of the 2D long-range XY model, identifying the crossover point at =2 and characterizing the critical properties across regimes.

Findings

Phase transition occurs for   2 into a ferromagnetic phase.

Correlation functions saturate or decay logarithmically depending on .

Crossover between regimes confirmed at =2.

Abstract

The two-dimensional (2D) XY model plays a crucial role in statistical and condensed matter physics. With the introduction of long-range interactions, the system exhibits a richer set of physical phenomena and a crossover between non-classical and short-range universality classes.In this work, we investigate the 2D XY model with algebraically decaying interactions $\sim 1/r^{2+\sigma}$, and provide a comprehensive numerical analysis of its thermodynamic properties. We demonstrate that for $\sigma \leq 2$, the system undergoes a second-order phase transition into a ferromagnetic phase characterized by the emergence of long-range order. In the low-temperature phase, due to the presence of the Goldstone mode, the correlation function saturates to a non-zero constant in the form of a power law for $\sigma < 2$, with decaying exponent $2-\sigma$, and in the form of the inverse logarithm of distance for $\sigma=2$. Moreover, the critical points and exponents are also determined for various $\sigma$. We provide compelling evidence that the crossover between non-classical and short-range regimes occurs at $\sigma=2$. This work presents a detailed account of the simulation methodology, extensive numerical data, and new insights into the physics of long-range interacting systems.