The stability of the O(N) invariant fixed point in three dimensions
Abstract
We study the stability of the O(N) fixed point in three dimensions under perturbations of the cubic type. We address this problem in the three cases N=2,3,4 by using finite size scaling techniques and high precision Monte Carlo simulations. It is well know that there is a critical value 2<Nc<4 below which the O(N) fixed point is stable and above which the cubic fixed point becomes the stable one. While we cannot exclude that Nc<3, as recently claimed by Kleinert and collaborators, our analysis strongly suggests that Nc coincides with 3.
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