Mass scaling of the near-critical 2D Ising model using random currents

Abstract

We examine the Ising model at its critical temperature with an external magnetic field h a158 on aZ2 for a,h >0. A new proof of exponential decay of the truncated two-point correlation functions is presented. It is proven that the mass (inverse correlation length) is of the order of h815 in the limit h 0. This was previously proven with CLE-methods in 1 . Our new proof uses instead the random current representation of the Ising model and its backbone exploration. The method further relies on recent couplings to the random cluster model 2 as well as a near-critical RSW-result for the random cluster model 3 .