Mean-field bound on the 1-arm exponent for Ising ferromagnets in high dimensions

Abstract

The 1-arm exponent for the ferromagnetic Ising model on Zd is the critical exponent that describes how fast the critical 1-spin expectation at the center of the ball of radius r surrounded by plus spins decays in powers of r. Suppose that the spin-spin coupling J is translation-invariant, Zd-symmetric and finite-range. Using the random-current representation and assuming the anomalous dimension η=0, we show that the optimal mean-field bound 1 holds for all dimensions d>4. This significantly improves a bound previously obtained by a hyperscaling inequality.