REAL-SPACE RENORMALIZATION-GROUP APPROACH TO THE RANDOM-FIELD ISING-MODEL

We discuss results from two types of real space renormalization group (RSRG) calculations applied to the random field Ising model in three dimensions. Starting from a lattice of size L, the RSRG is used to reduce the lattice to a size L = 2, on which the trace is done exactly. In this way, thermodynamic properties, such as the magnetization and susceptibility, can be determined approximately. We find that, for a given size, the susceptibility increases as the temperature, T, is reduced down to the transition temperature, T(c), and becomes essentially independent of temperature below T(c). Both in the vicinity of T(c) and at lower temperatures, there are large sample-to-sample fluctuations in the susceptibility which grow with increasing system size. We interpret these results in terms of the droplet theory of the transition.