Majority-vote model on (3,122), (4,6,12) and (4,82) Archimedean lattices

Abstract

On (3,122), (4,6,12) and (4,82) Archimedean lattices, the critical properties of majority-vote model are considered and studied using the Glauber transition rate proposed by Kwak et all. [Phys. Rev. E, 75, 061110 (2007)] rather than the traditional majority-vote with noise [Jos\'e M\'ario de Oliveira, J. Stat. Phys. 66, 273 (1992)]. The critical temperature and the critical exponents for this transition rate are obtained from extensive Monte Carlo simulations and with a finite size scaling analysis. The calculated values of the critical temperatures Binder cumulant are Tc=0.363(2) and U4*=0.577(4); Tc=0.651(3) and U4*=0.612(5); and Tc=0.667(2) and U4*=0.613(5) for (3,122), (4,6,12) and (4,82) lattices, respectively. The critical exponents β/, γ/ and 1/ for this model are 0.237(6), 0.73(10), and 0.83(5); 0.105(8), 1.28(11), and 1.16(5); 0.113(2), 1.60(4), and 0.84(6) for (3,122), (4,6,12) and (4,82) lattices, respectively. These results differ from the usual Ising model results and the majority-vote model on so-far studied regular lattices or complex networks.