Twisted Modules of a Vertex Operator Algebra and Associators as Classifying Morphisms

Abstract

The monoidal category of twisted modules of a Vertex Operator Algebra V is defined and reduced to its 2-group of invertible objects Gα, which can be described by a 3-cocycle α on its 0-truncation G with values in the group of units A of the field of definition of V serving as its associator. This cocycle also presents the classifying morphism of an ∞-group extension of G by the delooping BA. Motivated by this, it is proven that the ∞-group extension classified by a 3-cocycle α is presented by the skeletal 2-group Gα with associator α. The results are discussed in light of current developments in Moonshine and (∞,1)-topos theory.