Integrable degenerate E-models from 4d Chern-Simons theory

Abstract

We present a general construction of integrable degenerate E-models on a 2d manifold using the formalism of Costello and Yamazaki based on 4d Chern-Simons theory on × CP1. We begin with a physically motivated review of the mathematical results of [arXiv:2008.01829] where a unifying 2d action was obtained from 4d Chern-Simons theory which depends on a pair of 2d fields h and L on subject to a constraint and with L depending rationally on the complex coordinate on CP1. When the meromorphic 1-form ω entering the action of 4d Chern-Simons theory is required to have a double pole at infinity, the constraint between h and L was solved in [arXiv:2011.13809] to obtain integrable non-degenerate E-models. We extend the latter approach to the most general setting of an arbitrary 1-form ω and obtain integrable degenerate E-models. To illustrate the procedure we reproduce two well known examples of integrable degenerate E-models: the pseudo dual of the principal chiral model and the bi-Yang-Baxter σ-model.