A Monte Carlo study of the triangular lattice gas with the first- and the second-neighbor exclusions

Abstract

We formulate a Swendsen-Wang-like version of the geometric cluster algorithm. As an application,we study the hard-core lattice gas on the triangular lattice with the first- and the second-neighbor exclusions. The data are analyzed by finite-size scaling, but the possible existence of logarithmic corrections is not considered due to the limited data. We determine the critical chemical potential as μc=1.75682 (2) and the critical particle density as c=0.180(4). The thermal and magnetic exponents yt=1.51(1) ≈ 3/2 and yh=1.8748 (8) ≈ 15/8, estimated from Binder ratio Q and susceptibility , strongly support the general belief that the model is in the 4-state Potts universality class. On the other hand, the analyses of energy-like quantities yield the thermal exponent yt ranging from 1.440(5) to 1.470(5). These values differ significantly from the expected value 3/2, and thus imply the existence of logarithmic corrections.