The two upper critical dimensions of the Ising and Potts models

Abstract

We derive the exact actions of the Q-state Potts model valid on any graph, first for the spin degrees of freedom, and second for the Fortuin-Kasteleyn clusters. In both cases the field is a traceless Q-component scalar field α. For the Ising model (Q=2), the field theory for the spins has upper critical dimension d c spin=4, whereas for the clusters it has d c cluster=6. As a consequence, the probability for three points to be in the same cluster is not given by mean-field theory for d within 4<d<6. We estimate the associated universal structure constant as C=6-d+ O(6-d)3/2. This shows that some observables in the Ising model have an upper critical dimension of 4, while others have an upper critical dimension of 6. Combining perturbative results from the ε=6-d expansion with a non-perturbative treatment close to dimension d=4 allows us to locate the shape of the critical domain of the Potts model in the whole (Q,d) plane.

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