Exponents far fromfor the relaxation in the kinetic Ising model
- 1 January 1987
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review B
- Vol. 35 (1) , 394-396
- https://doi.org/10.1103/physrevb.35.394
Abstract
The Padé approximants for the linear and the nonlinear relaxation time of the order parameter in the square and simple cubic kinetic Ising model are reanalyzed. It is shown that as for the case of static phenomena for dynamical critical phenomena the temperature range where scaling ideas may be applied is dramatically extended when the conventional linear temperature variable (T-)/ is replaced by the nonlinear variable (T-)/T.
Keywords
This publication has 13 references indexed in Scilit:
- Comment on ‘‘Generalized Curie-Weiss Law’’Physical Review B, 1985
- Generalized Curie-Weiss lawPhysical Review B, 1985
- Analysis of high temperature susceptibility in iron and nickelJournal of Magnetism and Magnetic Materials, 1984
- Exponents far from Tc-a phenomenological expression for the susceptibility from Tcto infinite temperatureJournal of Physics C: Solid State Physics, 1984
- Exponents far from Tc-a reanalysis of the high-temperature susceptibility of some model systemsJournal of Physics C: Solid State Physics, 1984
- Critical behaviour of nickel between Tc and 3TcSolid State Communications, 1983
- Critical measurements in the spin glass CuMnJournal de Physique, 1983
- Crossover to mean-field behavior at marginal dimensionalityPhysical Review B, 1982
- Analysis of high temperature series of the spin S Ising model on the body-centred cubic latticeJournal de Physique, 1981
- Linear and nonlinear critical slowing down in the kinetic Ising model: High-temperature seriesPhysical Review B, 1976