Self-Averaging in the Three Dimensional Site Diluted Heisenberg Model at the critical point

Abstract

We study the self-averaging properties of the three dimensional site diluted Heisenberg model. The Harris criterion critharris states that disorder is irrelevant since the specific heat critical exponent of the pure model is negative. According with some analytical approaches harris, this implies that the susceptibility should be self-averaging at the critical temperature (R=0). We have checked this theoretical prediction for a large range of dilution (including strong dilution) at critically and we have found that the introduction of scaling corrections is crucial in order to obtain self-averageness in this model. Finally we have computed critical exponents and cumulants which compare very well with those of the pure model supporting the Universality predicted by the Harris criterion.

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