Fisher zeros of the Q-state Potts model in the complex temperature plane for nonzero external magnetic field

Abstract

The microcanonical transfer matrix is used to study the distribution of the Fisher zeros of the Q>2 Potts models in the complex temperature plane with nonzero external magnetic field Hq. Unlike the Ising model for Hq0 which has only a non-physical critical point (the Fisher edge singularity), the Q>2 Potts models have physical critical points for Hq<0 as well as the Fisher edge singularities for Hq>0. For Hq<0 the cross-over of the Fisher zeros of the Q-state Potts model into those of the (Q-1)-state Potts model is discussed, and the critical line of the three-state Potts ferromagnet is determined. For Hq>0 we investigate the edge singularity for finite lattices and compare our results with high-field, low-temperature series expansion of Enting. For 3 Q6 we find that the specific heat, magnetization, susceptibility, and the density of zeros diverge at the Fisher edge singularity with exponents αe, βe, and γe which satisfy the scaling law αe+2βe+γe=2.

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