Mehmet Dílaver, Semra Gündüç, Meral Aydın, Yiğit Gündüç
Published 2004-09-27Version 1
In this work we have calculated the dynamic critical exponent $z$ for 2-, 3- and 4-dimensional Ising models using the Wolff's algorithm through dynamic finite size scaling. We have studied time evolution of the average cluster size, the magnetization and higher moments of the magnetization. It is observed that dynamic scaling is independent of the algorithm. In this sense, universality is established for a wide range of algorithms with their own dynamic critical exponents. For scaling, we have used the literature values of critical exponents to observe the dynamic finite size scaling and to obtain the value of $z$. From the simulation data a very good scaling is observed leading to vanishingly small $z$ values for all three dimensions.
Comments: Latex, 9 eps figures. Submitted to Journal of Physics A: Mathematical and General
Dynamic critical exponents of Swendsen-Wang and Wolff algorithms by nonequilibrium relaxation
Time evolution of 1D gapless models from a domain-wall initial state: SLE continued?
Off-equilibrium computation of the dynamic critical exponent of the three-dimensional Heisenberg model
