Conserved Currents in the Six-Vertex and Trigonometric Solid-On-Solid Models
Abstract
We construct quasi-local conserved currents in the six-vertex model with anisotropy parameter by making use of the quantum-group approach of Bernard and Felder. From these currents, we construct parafermionic operators with spin that obey a discrete-integral condition around lattice plaquettes embedded into the complex plane. These operators are identified with primary fields in a compactified free Boson conformal field theory. We then consider a vertex-face correspondence that takes the six-vertex model to a trigonometric SOS model, and construct SOS operators that are the image of the six-vertex currents under this correspondence. We define corresponding SOS parafermionic operators with spins and that obey discrete integral conditions around SOS plaquettes embedded into the complex plane. We consider in detail the cyclic-SOS case corresponding to the choice , with coprime. We identify our SOS parafermionic operators in terms of the screening operators and primary fields of the associated conformal field theory.
Cite
@article{arxiv.1612.03666,
title = {Conserved Currents in the Six-Vertex and Trigonometric Solid-On-Solid Models},
author = {Yacine Ikhlef and Robert Weston},
journal= {arXiv preprint arXiv:1612.03666},
year = {2017}
}
Comments
28 pages