The presence of a random magnetic field in ferromagnetic systems leads, in the broken phase, to an anomalous convergence of some thermodynamic quantities to their asymptotic limits. Here we show a general method, based on the replica trick, to compute analytically the finite size correction to the average free energy. We apply this method to two mean field Ising models, fully connected and random regular graphs, and compare the results to exact numerical algorithms. We argue that this behaviour is present in finite dimensional models as well.
Anomalous finite size corrections in random field models
Lucibello, Carlo;
2014
Abstract
The presence of a random magnetic field in ferromagnetic systems leads, in the broken phase, to an anomalous convergence of some thermodynamic quantities to their asymptotic limits. Here we show a general method, based on the replica trick, to compute analytically the finite size correction to the average free energy. We apply this method to two mean field Ising models, fully connected and random regular graphs, and compare the results to exact numerical algorithms. We argue that this behaviour is present in finite dimensional models as well.
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