On the two-point function of the Potts model in the saturation regime

Abstract

We consider the Random-Cluster model on Zd with interactions of infinite range of the form Jx = (x)e-(x) with a norm on Zd and a subexponential correction. We first provide an optimal criterion ensuring the existence of a nontrivial saturation regime (that is, the existence of β sat(s)>0 such that the inverse correlation length in the direction s is constant on [0,β sat(s))), thus removing a regularity assumption used in a previous work of ours. Then, under suitable assumptions, we derive sharp asymptotics (which are not of Ornstein-Zernike form) for the two-point function in the whole saturation regime (0,β sat(s)). We also obtain a number of additional results for this class of models, including sharpness of the phase transition, mixing above the critical temperature and the strict monotonicity of the inverse correlation length in β in the regime (β sat(s), β c).

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