Critical points for spread-out self-avoiding walk, percolation and the contact process above the upper critical dimensions

Abstract

We consider self-avoiding walk and percolation in , oriented percolation in ×, and the contact process in , with p D(·) being the coupling function whose range is denoted by L<∞. For percolation, for example, each bond \x,y\ is occupied with probability p D(y-x). The above models are known to exhibit a phase transition when the parameter p varies around a model-dependent critical point . We investigate the value of when d>6 for percolation and d>4 for the other models, and L1. We prove in a unified way that =1+C(D)+O(L-2d), where the universal term 1 is the mean-field critical value, and the model-dependent term C(D)=O(L-d) is written explicitly in terms of the function D. Our proof is based on the lace expansion for each of these models.

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