English

Conserved Currents in the Six-Vertex and Trigonometric Solid-On-Solid Models

Mathematical Physics 2017-04-05 v1 Statistical Mechanics High Energy Physics - Theory math.MP

Abstract

We construct quasi-local conserved currents in the six-vertex model with anisotropy parameter η\eta by making use of the quantum-group approach of Bernard and Felder. From these currents, we construct parafermionic operators with spin 1+iη/π1+i\eta/\pi that obey a discrete-integral condition around lattice plaquettes embedded into the complex plane. These operators are identified with primary fields in a c=1c=1 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 s=1s=1 and s=1+2iη/πs=1+2i\eta/\pi 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 η=iπ(pp)/p\eta=i\pi (p-p')/p, with p<pp'<p coprime. We identify our SOS parafermionic operators in terms of the screening operators and primary fields of the associated c=16(pp)2/ppc=1-6(p-p')^2/pp' 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

R2 v1 2026-06-22T17:20:33.148Z