Twists of trigonometric sigma models

We introduce the $\mathbb{Z}_N$-twisted trigonometric sigma models, a new class of integrable deformations of the principal chiral model. Starting from 4d Chern-Simons theory on a cylinder, the models are constructed by introducing a $\mathbb{Z}_N$ branch cut running along the non-compact direction. As we pass through the branch cut we apply a $\mathbb{Z}_N$ automorphism to the algebra-valued and group-valued fields of the theory. Two instances of models in this class have appeared in the literature and we explain how these fit into our general construction. We generalise both to the case of $\mathbb{Z}_N$-twistings, and for each we construct two further deformations, leading to four doubly-deformed models. Mapping the cylinder to a sphere, a novel feature of the construction is that the branch points are at the simple poles corresponding to the ends of the cylinder. As a result, the untwisted and twisted models have the same number of degrees of freedom. While twisting does not always lead to inequivalent models, we show that if we use the $\mathbb{Z}_2$ outer automorphism of $\mathfrak{g}^{\mathbb{C}} = \mathfrak{sl}(n;\mathbb{C})$ to twist, then the untwisted and twisted models have different symmetries, hence the latter are new integrable sigma models.