Universal 1-loop divergences for integrable sigma models
Abstract
We present a simple, new method for the 1-loop renormalization of integrable -models. By treating equations of motion and Bianchi identities on an equal footing, we derive 'universal' formulae for the 1-loop on-shell divergences, generalizing case-by-case computations in the literature. Given a choice of poles for the classical Lax connection, the divergences take a theory-independent form in terms of the Lax currents (the residues of the poles), assuming a 'completeness' condition on the zero-curvature equations. We compute these divergences for a large class of theories with simple poles in the Lax connection. We also show that coset models of 'pure-spinor' type and their recently constructed - and -deformations are 1-loop renormalizable, and 1-loop scale-invariant when the Killing form vanishes.
Keywords
Cite
@article{arxiv.2209.05502,
title = {Universal 1-loop divergences for integrable sigma models},
author = {Nat Levine},
journal= {arXiv preprint arXiv:2209.05502},
year = {2023}
}
Comments
27 pages, 6 figures; v4: minor corrections