Critical two-point function for long-range models with power-law couplings: The marginal case for d dc

Abstract

Consider the long-range models on Zd of random walk, self-avoiding walk, percolation and the Ising model, whose translation-invariant 1-step distribution/coupling coefficient decays as |x|-d-α for some α>0. In the previous work (Ann. Probab., 43, 639--681, 2015), we have shown in a unified fashion for all α2 that, assuming a bound on the "derivative" of the n-step distribution (the compound-zeta distribution satisfies this assumed bound), the critical two-point function Gpc(x) decays as |x|α2-d above the upper-critical dimension dc(α2)m, where m=2 for self-avoiding walk and the Ising model and m=3 for percolation. In this paper, we show in a much simpler way, without assuming a bound on the derivative of the n-step distribution, that Gpc(x) for the marginal case α=2 decays as |x|2-d/|x| whenever d dc (with a large spread-out parameter L). This solves the conjecture in the previous work, extended all the way down to d=dc, and confirms a part of predictions in physics (Brezin, Parisi, Ricci-Tersenghi, J. Stat. Phys., 157, 855--868, 2014). The proof is based on the lace expansion and new convolution bounds on power functions with log corrections.