FK-Ising coupling applied to near-critical planar models

Abstract

We consider the Ising model at its critical temperature with external magnetic field ha15/8 on aZ2. We give a purely probabilistic proof, using FK methods rather than reflection positivity, that for a=1, the correlation length is ≥ const.~h-8/15 as h0. We extend to the a0 continuum limit the FK-Ising coupling for all h>0, and obtain tail estimates for the largest renormalized cluster area in a finite domain as well as an upper bound with exponent 1/8 for the one-arm event. Finally, we show that for a=1, the average magnetization, M(h), in Z2 satisfies M(h)/h1/15→ some B∈(0,∞) as h0.