High-Activity Expansion for the Columnar Phase of the Hard Rectangle Gas

Abstract

We study a system of monodispersed hard rectangles of size m × d, where d≥ m on a two dimensional square lattice. For large enough aspect ratio, the system is known to undergo three entropy driven phase transitions with increasing activity z: first from disordered to nematic, second from nematic to columnar and third from columnar to sublattice phases. We study the nematic-columnar transition by developing a high-activity expansion in integer powers of z-1/d for the columnar phase in a model where the rectangles are allowed to orient only in one direction. By deriving the exact expression for the first d+2 terms in the expansion, we obtain lower bounds for the critical density and activity. For m, k 1, these bounds decrease with increasing k and decreasing m.