Asymptotic Behavior of the Isotropic-Nematic and Nematic-Columnar Phase Boundaries for the System of Hard Rectangles on a Square lattice

Abstract

A system of hard rectangles of size m× mk on a square lattice undergoes three entropy driven phase transitions with increasing density for large enough aspect ratio k: first from a low density isotropic to an intermediate density nematic phase, second from the nematic to a columnar phase, and third from the columnar to a high density sublattice phase. In this paper we show, from extensive Monte Carlo simulations of systems with m=1,2 and 3, that the transition density for the isotropic-nematic transition is ≈ A1/k when k 1, where A1 is independent of m. We estimate A1=4.80 0.05. Within a Bethe approximation, we obtain A1=2 and the virial expansion truncated at second virial coefficient gives A1=1. The critical density for the nematic-columnar transition when m=2 is numerically shown to tend to a value less than the full packing density as k-1 when k ∞. We find that the critical Binder cumulant for this transition is non-universal and decreases as k-1 for k 1. However, the transition is shown to be in the Ising universality class.