Asymptotics of spin-spin correlators weighted by fermion number measurements with low rapidity threshold in the 2D Ising free-fermion QFT
摘要
In the work, we study the averaged number of massive fermions above a low rapidity threshold Y, underlying the form-factor expansions of the spin-spin two-point correlators at an Euclidean distance r, in the 2D Ising QFT at the free massive fermion point. Despite the on-shell freeness, the spin operators are still far away from being Gaussian, and create particles in the asymptotic states with complicated correlations. We show how the number observables can still be incorporated into the integrable Sinh-Gordon/Painleve-III framework and controlled by linear differential equations with two variables (r, Y). We show how the differential equations and the information of two crucial scaling functions arising in the r → 0,