Cohomological vertex algebras

Abstract

Vertex algebras (and their modules) can be described as vector spaces together with a linear operator-valued series in one parameter z. With the interpretation of z as a coordinate at a point on a curve, one can construct algebraic structures on the moduli space of curves from V-modules. Here we propose a generalization of vertex algebras involving linear operators in parameters z1,…,zn. One may interpret these as being the components of a set of coordinates on an n-dimensional algebraic variety. These are referred to as cohomological vertex algebras (CVAs): the formal punctured 1-disk underlying a vertex algebra is replaced by a ring modeling the cohomology of certain modifications of the formal n-disk. We prove several structural theorems for CVAs and give a definition of cohomological vertex operator algebras (CVOAs). Using a reconstruction theorem for CVAs, we provide basic examples such as the βγ-system, the Heisenberg CVA, and the affine Kac-Moody CVAs. We use these constructions to describe BRST reduction, leading to an analog of W-algebras.