Ising model with a magnetic field

Abstract

The paper presents the low temperature expansion of the 2D Ising model in the presence of the magnetic field in powers of x=(-J/(kT)) and z=(B/(kT)) with full polynomials in z up to x88 and full polynomials in x4 up to z-60, in the latter case the polynomials are explicitly given. The new result presented in the paper is an expansion not in inverse powers of z but in (z2+x8)-k where the subsequent coefficients (polynomials in x4) turn out to be divisible by increasing powers of (1-x4). The paper describes both the analytic expansions of the partition function and the efficient combinatorial methods to get the coefficients of the expansion.