Ferromagnetic Potts models with multisite interaction

Abstract

We study the q states Potts model with four site interaction on the square lattice. Based on the asymptotic behaviour of lattice animals, it is argued that when q≤ 4 the system exhibits a second-order phase transition, and when q > 4 the transition is first order. The q=4 model is borderline. We find 1/ q to be an upper bound on Tc, the exact critical temperature. Using a low-temperature expansion, we show that 1/(θ q), where θ>1 is a q-dependent geometrical term, is an improved upper bound on Tc. In fact, our findings support Tc=1/(θ q). This expression is used to estimate the finite correlation length in first-order transition systems. These results can be extended to other lattices. Our theoretical predictions are confirmed numerically by an extensive study of the four-site interaction model using the Wang-Landau entropic sampling method for q=3,4,5. In particular, the q=4 model shows an ambiguous finite-size pseudocritical behaviour.