Equivalent-neighbor Potts models in two dimensions
Abstract
We investigate the two-dimensional and 4 Potts models with a variable interaction range by means of Monte Carlo simulations. We locate the phase transitions for several interaction ranges as expressed by the number of equivalent neighbors. For not too large , the transitions fit well in the universality classes of the short-range Potts models. However, at longer ranges the transitions become discontinuous. For we locate a tricritical point separating the continuous and discontinuous transitions near , and a critical fixed point between and 12. For the transition becomes discontinuous for . The scaling behavior of the model with approximates that of the merged critical-tricritical fixed point predicted by the renormalization scenario.
Cite
@article{arxiv.1609.08831,
title = {Equivalent-neighbor Potts models in two dimensions},
author = {Xiaofeng Qian and Youjin Deng and Yuhai Liu and Wenan Guo and Henk W. J. Bloete},
journal= {arXiv preprint arXiv:1609.08831},
year = {2016}
}
Comments
9 figures