The low-temperature phase in the two-dimensional long-range diluted XY model

Abstract

The critical behaviour of statistical models with long-range interactions exhibits distinct regimes as a function of , the power of the interaction strength decay. For large enough, > sr, the critical behaviour is observed to coincide with that of the short-range model. However, there are controversial aspects regarding this picture, one of which is the value of the short-range threshold sr in the case of the long-range XY model in two dimensions. We study the 2d XY model on the diluted graph, a sparse graph obtained from the 2d lattice by rewiring links with probability decaying with the Euclidean distance of the lattice as |r|-, which is expected to feature the same critical behavior of the long range model. Through Monte Carlo sampling and finite-size analysis of the spontaneous magnetisation and of the Binder cumulant, we present numerical evidence that sr=4. According to such a result, one expects the model to belong to the Berezinskii-Kosterlitz-Thouless (BKT) universality class for 4, and to present a 2nd-order transition for <4.