Finite-size spectrum of the staggered six-vertex model with antidiagonal boundary conditions

authored by
Holger Frahm, Sascha Gehrmann
Abstract

The finite-size spectrum of the critical staggered six-vertex model with antidiagonal boundary conditions is studied. Similar to the case of periodic boundary conditions, we identify three different phases. In two of those, the underlying conformal field theory can be identified to be related to the twisted \(U(1)\) Kac-Moody algebra. In contrast, the finite size scaling in the third regime, whose critical behaviour with the (quasi-)periodic BCs is related to the 2d black hole CFTs possessing a non-compact degree of freedom, is more subtle. Here with antidiagonal BCs imposed, the corrections to the scaling of the ground state grow logarithmically with the system size, while the energy gaps appear to close logarithmically. Moreover, we obtain an explicit formula for the Q-operator which is useful for numerical implementation.

Organisation(s)
Institute of Theoretical Physics
Type
Article
Journal
Nuclear Physics B
Volume
1006
No. of pages
13
ISSN
0550-3213
Publication date
09.2024
Publication status
Published
Peer reviewed
Yes
ASJC Scopus subject areas
Nuclear and High Energy Physics
Electronic version(s)
https://arxiv.org/abs/2405.20919 (Access: Open)
https://doi.org/10.1016/j.nuclphysb.2024.116655 (Access: Open)