Potts model with q=4,6, and 8 states on Voronoi-Delaunay random lattice

Abstract

Through Monte Carlo simulations we study two-dimensional Potts models with q=4, 6 and 8 states on Voronoi-Delaunay random lattice. In this study, we assume that the coupling factor J varies with the distance r between the first neighbors as J(r) e-a r, with a ≥ 0 . The disordered system is simulated applying the singler-cluster Monte Carlo update algorithm and reweigting technique. In this model both second-order and first-order phase transition are present depending of q values and a parameter. The critical exponents ratio β/, γ/, and 1/ were calculated for case where the second-order phase transition are present. In the Potts model with q=8 we also studied the distribution of clusters sizes.