2d QCD and Integrability, Part II: Generalized QCD
Abstract
We extend the study of integrable structures and analyticity of the spectrum in large QCD to a broad class of theories called the generalized QCD, which are given by the Lagrangian coupled to quarks in the fundamental representation. We recast the Bethe-Salpeter equation for the meson spectrum into a TQ-Baxter equation and determine a transfer matrix in a closed form for any given polynomial . Using an associated Fredholm equation, we numerically study the analytic structures of the spectrum as a function of the coefficients of . We determine the region of couplings where the theory admits a positive and discrete spectrum of mesons. Furthermore, we uncover a multi-sheeted structure with infinitely many multi-critical points, where several mesons become simultaneously massless. Lastly, we illustrate that this structure persists in the large-representation limit of the generalized QCD with the SU(2) gauge group.
Cite
@article{arxiv.2406.11078,
title = {2d QCD and Integrability, Part II: Generalized QCD},
author = {Federico Ambrosino and Shota Komatsu},
journal= {arXiv preprint arXiv:2406.11078},
year = {2024}
}
Comments
54 pages; v3: references added, section 3.5 rewritten