Scaling functions in the square Ising model

Abstract

We show and give the linear differential operators Lscalq of order q= n2/4+n+7/8+(-1)n/8, for the integrals In(r) which appear in the two-point correlation scaling function of Ising model F(r)= scaling M-2 < σ0,0 \, σM,N> = Σn In(r). The integrals In(r) are given in expansion around r= 0 in the basis of the formal solutions of \, Lscalq with transcendental combination coefficients. We find that the expression r1/4\,(r2/8) is a solution of the Painlev\'e VI equation in the scaling limit. Combinations of the (analytic at r= 0) solutions of Lscalq sum to (r2/8). We show that the expression r1/4 (r2/8) is the scaling limit of the correlation function C(N, N) and C(N, N+1). The differential Galois groups of the factors occurring in the operators Lscalq are given.