Lattice models, differential forms, and the Yang-Baxter equation
Combinatorics
2022-07-28 v1
Abstract
We introduce new methods to describe admissible states of the six-vertex and the eight-vertex lattice models of statistical mechanics. For the six-vertex model, we view the admissible states as differential forms on a grid graph. This yields a new proof of the correspondence between admissible states and 3-colorings of a rectangular grid. For the eight-vertex model, we interpret the set of admissible states as an -vector space. This viewpoint lets us enumerate the set of admissible states. Finally, we find necessary conditions for a Yang-Baxter equation to hold for the general eight-vertex model.
Keywords
Cite
@article{arxiv.2207.13282,
title = {Lattice models, differential forms, and the Yang-Baxter equation},
author = {Kedar Karhadkar},
journal= {arXiv preprint arXiv:2207.13282},
year = {2022}
}