On Properties of the Ising Model for Complex Energy/Temperature and Magnetic Field

Abstract

We study some properties of the Ising model in the plane of the complex (energy/temperature)-dependent variable u=e-4K, where K=J/(kBT), for nonzero external magnetic field, H. Exact results are given for the phase diagram in the u plane for the model in one dimension and on infinite-length quasi-one-dimensional strips. In the case of real h=H/(kBT), these results provide new insights into features of our earlier study of this case. We also consider complex h=H/(kBT) and μ=e-2h. Calculations of complex-u zeros of the partition function on sections of the square lattice are presented. For the case of imaginary h, i.e., μ=eiθ, we use exact results for the quasi-1D strips together with these partition function zeros for the model in 2D to infer some properties of the resultant phase diagram in the u plane. We find that in this case, the phase boundary Bu contains a real line segment extending through part of the physical ferromagnetic interval 0 u 1, with a right-hand endpoint urhe at the temperature for which the Yang-Lee edge singularity occurs at μ=e iθ. Conformal field theory arguments are used to relate the singularities at urhe and the Yang-Lee edge.