Zero-Temperature Coarsening in the Two-Dimensional Long-Range Ising Model
Abstract
We investigate the nonequilibrium dynamics following a quench to zero temperature of the non-conserved Ising model with power-law decaying long-range interactions in spatial dimensions. The zero-temperature coarsening is always of special interest among nonequilibrium processes, because often peculiar behavior is observed. We provide estimates of the nonequilibrium exponents, viz., the growth exponent , the persistence exponent , and the fractal dimension . It is found that the growth exponent is independent of and different from as expected for nearest-neighbor models. In the large regime of the tunable interactions only the fractal dimension of the nearest-neighbor Ising model is recovered, while the other exponents differ significantly. For the persistence exponent this is a direct consequence of the different growth exponents as can be understood from the relation ; they just differ by the ratio of the growth exponents . This relation has been proposed for annihilation processes and later numerically tested for the nearest-neighbor Ising model. We confirm this relation for all studied, reinforcing its general validity.
Cite
@article{arxiv.2011.06098,
title = {Zero-Temperature Coarsening in the Two-Dimensional Long-Range Ising Model},
author = {Henrik Christiansen and Suman Majumder and Wolfhard Janke},
journal= {arXiv preprint arXiv:2011.06098},
year = {2021}
}