Finite size analysis of a two-dimensional Ising model within a nonextensive approach

Abstract

In this work we present a thorough analysis of the phase transitions that occur in a ferromagnetic 2D Ising model, with only nearest-neighbors interactions, in the framework of the Tsallis nonextensive statistics. We performed Monte Carlo simulations on square lattices with linear sizes L ranging from 32 up to 512. The statistical weight of the Metropolis algorithm was changed according to the nonextensive statistics. Discontinuities in the m(T) curve are observed for q≤ 0.5. However, we have verified only one peak on the energy histograms at the critical temperatures, indicating the occurrence of continuous phase transitions. For the 0.5<q≤ 1.0 regime, we have found continuous phase transitions between the ordered and the disordered phases, and determined the critical exponents via finite-size scaling. We verified that the critical exponents α , β and γ depend on the entropic index q in the range 0.5<q≤ 1.0 in the form α (q)=(10 q2-33 q+23)/20, β (q)=(2 q-1)/8 and γ (q)=(q2-q+7)/4. On the other hand, the critical exponent does not depend on q. This suggests a violation of the scaling relations 2 β +γ =d and α +2 β +γ =2 and a nonuniversality of the critical exponents along the ferro-paramagnetic frontier.