High-dimensional long-range statistical mechanical models have random walk correlation functions
Abstract
We consider long-range percolation, Ising model, and self-avoiding walk on Zd, with couplings decaying like |x|-(d+α) where 0 < α 2, above the upper critical dimensions. In the spread-out setting where the lace expansion applies, we show that the two-point function for each of these models exactly coincides with a random walk two-point function, up to a constant prefactor. Using this, for 0<α < 2, we prove upper and lower bounds of the form |x|-(d-α) \ 1, (pc - p)-2 |x|-2α \ for the two-point function near the critical point pc. For α=2, we obtain a similar upper bound with logarithmic corrections. We also give a simple proof of the convergence of the lace expansion, assuming diagrammatic estimates.
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