Complex-Temperature Singularities in the $d=2$ Ising Model. II. Triangular Lattice
Abstract
We investigate complex-temperature singularities in the Ising model on the triangular lattice. Extending an earlier analysis of the low-temperature series expansions for the (zero-field) susceptibility by Guttmann \cite{g75} to include the use of differential approximants, we obtain further evidence in support of his conclusion that the exponent describing the divergence in at (where ) is and refine his estimate of the critical amplitude. We discuss the remarkable nature of this singularity, at which the spontaneous magnetisation diverges (with exponent ) and show that it lies at the endpoint of a singular line segment constituting part of the natural boundaries of the free energy in the complex plane. Using exact results, we find that the specific heat has a divergent singularity at with exponent , so that the relation is satisfied. We also study the singularity at , where vanishes (with ) and diverges logarithmically (with ).
Cite
@article{arxiv.hep-lat/9411023,
title = {Complex-Temperature Singularities in the $d=2$ Ising Model. II. Triangular Lattice},
author = {V. Matveev and R. Shrock},
journal= {arXiv preprint arXiv:hep-lat/9411023},
year = {2009}
}
Comments
latex file, 25 pages of text plus figures appended to end of file. (Further references have been included to important earlier works in this area by A. J. Guttmann. )