Differential graded vertex Lie algebras

TL;DR

This paper extends the concept of vertex Lie algebras to the differential graded setting and constructs a functor that creates dg vertex algebras from dg vertex Lie algebras, aiding in homotopy theory development.

Contribution

It introduces a functor from dg vertex Lie algebras to dg vertex algebras, providing new examples and advancing the homotopy theory of vertex algebras.

Findings

Constructed a pair of adjoint functors between dg vertex algebras and dg vertex Lie algebras.

Explicit examples based on Virasoro and Neveu-Schwarz algebras.

Established a foundation for homotopy theory in vertex algebra categories.

Abstract

This is the continuation of the study of differential graded (dg) vertex algebras previously defined by the authors. The goal of this paper is to construct a functor from the category of dg vertex Lie algebras to the category of dg vertex algebras which is left adjoint to the forgetful functor. This functor not only provides an abundant number of examples of dg vertex algebras, but it is also an important step in constructing a homotopy theory in the category of vertex algebras. Vertex Lie algebras were introduced as analogues of vertex algebras, but in which we only consider the singular part of the vertex operator map and the equalities it satisfies. In this paper, we extend the definition of vertex Lie algebras to the dg setting. We construct a pair of adjoint functors between the categories of dg vertex algebras and dg vertex Lie algebras, which leads to the explicit construction of dg vertex (operator) algebras. We will give examples based on the Virasoro algebra, the Neveu-Schwarz algebra, and dg Lie algebras.