Complex-Temperature Singularities of the Susceptibility in the d=2 Ising Model. I. Square Lattice

Abstract

We investigate the complex-temperature singularities of the susceptibility of the 2D Ising model on a square lattice. From an analysis of low-temperature series expansions, we find evidence that as one approaches the point u=us=-1 (where u=e-4K) from within the complex extensions of the FM or AFM phases, the susceptibility has a divergent singularity of the form As'(1+u)-γs' with exponent γs'=3/2. The critical amplitude As' is calculated. Other critical exponents are found to be αs'=αs=0 and βs=1/4, so that the scaling relation αs'+2βs+γs'=2 is satisfied. However, using exact results for βs on the square, triangular, and honeycomb lattices, we show that universality is violated at this singularity: βs is lattice-dependent. Finally, from an analysis of spin-spin correlation functions, we demonstrate that the correlation length and hence susceptibility are finite as one approaches the point u=-1 from within the symmetric phase. This is confirmed by an explicit study of high-temperature series expansions.

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