P. A. Rikvold, G. Korniss, C. J. White, M. A. Novotny, S. W. Sides
Published 1999-04-01, updated 1999-04-05Version 2
We briefly introduce hysteresis in spatially extended systems and the dynamic phase transition observed as the frequency of the oscillating field increases beyond a critical value. Hysteresis and the decay of metastable phases are closely related phenomena, and a dynamic phase transition can occur only for field amplitudes, temperatures, and system sizes at which the metastable phase decays through nucleation and growth of many droplets. We present preliminary results from extensive Monte Carlo simulations of a two-dimensional kinetic Ising model in a square-wave oscillating field and estimate critical exponents by finite-size scaling techniques adapted from equilibrium critical phenomena. The estimates are consistent with the universality class of the two-dimensional equilibrium Ising model and inconsistent with two-dimensional random percolation. However, we are not aware of any theoretical arguments indicating why this should be so. Thus, the question of the universality class of this nonequilibrium critical phenomenon remains open.
Comments: LaTex 17 pages, including eps and ps figures. Submitted for inclusion in Computer Simulation Studies in Condensed Matter Physics XII, edited by D.P. Landau, et al. (Springer, Heidelberg, in press) Revision only changes misprints in bibliographic information
Journal: Computer Simulation Studies in Condensed Matter Physics XII, edited by D.P. Landau, et al., Springer Proceedings in Physics Vol. 85 (Springer, Berlin, 2000), pp. 105-119.
Kinetic Ising model in an oscillating field: Avrami theory for the hysteretic response and finite-size scaling for the dynamic phase transition
Kinetic Ising model in an oscillating field: Finite-size scaling at the dynamic phase transition
Dynamic phase transition of the Blume-Capel model in an oscillating magnetic field
