Percolation in three-dimensional random field Ising magnets
Abstract
The structure of the three-dimensional random field Ising magnet is studied by ground state calculations. We investigate the percolation of the minority spin orientation in the paramagnetic phase above the bulk phase transition, located at [Delta/J]c ~= 2.27, where Delta is the standard deviation of the Gaussian random fields (J=1). With an external field H there is a disorder strength dependent critical field +/- Hc(Delta) for the down (or up) spin spanning. The percolation transition is in the standard percolation universality class. Hc ~ (Delta - Deltap)delta, where Deltap = 2.43 +/- 0.01 and delta = 1.31 +/- 0.03, implying a critical line for Deltac < Delta <= Deltap. When, with zero external field, Delta is decreased from a large value there is a transition from the simultaneous up and down spin spanning, with probability Piuparrow downarrow = 1.00 to Piuparrow downarrow = 0. This is located at Delta = 2.32 +/- 0.01, i.e., above Deltac. The spanning cluster has the fractal dimension of standard percolation Df = 2.53 at H = Hc(Delta). We provide evidence that this is asymptotically true even at H=0 for Deltac < Delta <= Deltap beyond a crossover scale that diverges as Deltac is approached from above. Percolation implies extra finite size effects in the ground states of the 3D RFIM.
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