Leading corrections to the scaling function on the diagonal for the two-dimensional Ising model

TL;DR

This paper characterizes the leading corrections to the scaling functions of the two-dimensional Ising model near criticality, identifying the order $N^{-2}$ correction as the first non-trivial term and providing a method to compute it.

Contribution

It introduces a detailed analysis of the first two correction terms to the scaling functions for the diagonal correlations, clarifying the order $N^{-2}$ correction and its computation.

Findings

Leading correction at order $N^{-1}$ is trivial and can be eliminated.

The first non-trivial correction appears at order $N^{-2}$.

Provides a differential equation-based method to compute correction terms.

Abstract

In the neighbourhood of the critical point, the correlation length of the spin-spin correlation function of the two-dimensional Ising model diverges. The correlation function permits a scaling limit in which the separation $N$ between spins goes to infinity, but the scaling variable $s = N(1-t)/2$ remains fixed, where $t$ is the coupling, and $t=1$ the critical point. Previous work has specified these scaling functions (there is one for the critical point being approached from above, and another if approached from below) in terms of transcendents defined by a particular $\sigma$-form of the degenerate Painlev\'e V equation. For the diagonal-diagonal correlation, we characterise the first two leading large $N$ correction terms to the scaling functions --- these occur at orders $N^{-1}$ and $N^{-2}$ --- in terms of solutions of a second order linear differential equation with coefficients given in terms of these transcendents, and show how they can be computed. We show that the order $N^{-1}$ is trivial and can be eliminated through appropriate variables so that the leading non-trivial correction is of order $N^{-2}$. In this respect our result gives precise and full characterisation of claims made in the earlier literature.