Abstract
The equilibration of Ising systems in random magnetic fields at low temperatures () following a quench from high is studied in the framework of a simple solid-on-solid model. The rate at which ordered domains in the model grow with time in any dimension () is estimated as a function of the random-field strength, the exchange strength, and , on the basis of an approximate analogy to the problem of a one-dimensional random walk in a random medium. Domains are argued to grow logarithmically with time for all . This result has a simple interpretation in terms of energy barriers which must be surmounted in the equilibration process.
- Received 27 February 1984
DOI:https://doi.org/10.1103/PhysRevB.29.6389
©1984 American Physical Society