On the two-point function of the Ising model with infinite range-interactions

Abstract

In this article, we prove some results concerning the truncated two-point function of the infinite-range Ising model above and below the critical temperature. More precisely, if the coupling constants are of the form Jx= (x)e -(x) with some norm and an subexponential correction, we show under appropriate assumptions that given s∈Sd-1, the Laplace transform of the two-point function in the direction s is infinite for β=βsat(s) (where βsat(s) is a the biggest value such that the inverse correlation length β(s) associated to the truncated two-point function is equal to (s) on [0,βsat(s))). Moreover, we prove that the two-point function satisfies Ornstein-Zernike asymptotics for β=βsat(s) on Z. As far as we know, this constitutes the first result on the behaviour of the two-point function at βsat(s). Finally, we show that there exists β0 such that for every β>β0, β(s)=(s). All the results are new.