| Popis: |
A vertex algebra with an action of a group $G$ comes with a notion of $g$-twisted modules, forming a $G$-crossed braided tensor category. For a Lie group $G$, one might instead wish for a notion of $(\mathrm{d}+A)$-twisted modules for any $\mathfrak{g}$-connection on the formal punctured disc. For connections with a regular singularity, this reduces to $g$-twisted modules, where $g$ is the monodromy around the puncture. The case of an irregular singularity is much richer and involved, and we are not aware that it has appeared in vertex algebra language. The present article is intended to spark such a treatment, by providing a list of expectations and an explicit worked-through example with interesting applications. Concretely, we consider the vertex super algebra of symplectic fermions, or equivalently the triplet vertex algebra $\mathcal{W}_p(\mathfrak{sl}_2)$ for $p=2$, and study its twisted module with respect to irregular $\mathfrak{sl}_2$-connections. We first determine the category of representations, depending on the formal type of the connection. Then we prove that a Sugawara type construction gives a Virasoro action and we prove that as Virasoro modules our representations are direct sums of Whittaker modules. Conformal field theory with irregular singularities resp. wild ramification appear in the context of geometric Langlands correspondence, and in particular in work by Witten [Wit08]. It has also been studied for example in the context of Gaudin models [FFTL10] and in the context of AGT correspondence [GT12]. Our original motivation comes from semiclassical limits of the generalized quantum Langlands kernel, which fibres over the space of connections [FL24], similar to the affine Lie algebra at critical level. Our present article now describes, in the smallest case, the |
