Abstract
Using extensive Monte Carlo simulations, we study the equilibrium properties of the simple-cubic, classical Heisenberg ferromagnet. We employ very long runs for L×L×L lattices to obtain high-precision data for the magnetization probability distribution. Using finite-size scaling for L≤24 and an optimized multiple-histogram data analysis, we obtain an accurate value of the inverse critical temperature J/=0.6929±0.0001, which is higher than previously accepted estimates. Calculated values of various static exponents are in excellent agreement with renormalization-group and ε-expansion predictions.
- Received 5 October 1990
DOI:https://doi.org/10.1103/PhysRevB.43.6087
©1991 American Physical Society