Planar Ising magnetization field II. Properties of the critical and near-critical scaling limits

Abstract

In [CGN12], we proved that the renormalized critical Ising magnetization fields a:= a15/8 Σx∈ a\, 2 σx \, δx converge as a 0 to a random distribution that we denoted by ∞. The purpose of this paper is to establish some fundamental properties satisfied by this ∞ and the near-critical fields ∞,h. More precisely, we obtain the following results. [(i)] If A⊂ is a smooth bounded domain and if m=mA := <∞, 1A denotes the limiting rescaled magnetization in A, then there is a constant c=cA>0 such that equation* m > x x ∞ -c \; x16\,.equation* In particular, this provides an alternative proof that the field ∞ is non-Gaussian (another proof of this fact would use the n-point correlation functions established in CHI which do not satisfy Wick's formula). [(ii)] The random variable m=mA has a smooth density and one has more precisely the following bound on its Fourier transform: |ei\,t m | e- c\, |t|16/15. [(iii)] There exists a one-parameter family ∞,h of near-critical scaling limits for the magnetization field in the plane with vanishingly small external magnetic field.