Homotopy conformal algebras

TL;DR

This paper introduces homotopy and categorified versions of conformal algebras, establishing their properties, relationships, and cohomological characterizations within the framework of conformal field theory.

Contribution

It develops the theory of $A_ abla$-conformal and $L_ abla$-conformal algebras, including their equivalences and cohomological descriptions, advancing the understanding of conformal algebra structures.

Findings

Defined $A_ abla$-conformal algebras and proved the homotopy transfer theorem.

Established the equivalence between associative conformal 2-algebras and 2-term $A_ abla$-conformal algebras.

Explored the relations between $L_ abla$-conformal and $A_ abla$-conformal algebras.

Abstract

The notion of conformal algebras was introduced by Victor G. Kac using the axiomatic description of the operator product expansion of chiral fields in conformal field theory. The structure theory, representations and cohomology of Lie and associative conformal algebras are extensively studied in the literature. In this paper, we first introduce $A_\infty$-conformal algebras as the homotopy analogue of associative conformal algebras, provide some equivalent descriptions and prove the homotopy transfer theorem. We characterize some $A_\infty$-conformal algebras in terms of Hochschild cohomology classes of associative conformal algebras. Next, we introduce associative conformal $2$-algebras as the categorification of associative conformal algebras. We show that the category of associative conformal $2$-algebras and the category of $2$-term $A_\infty$-conformal algebras are equivalent. Finally, we consider $L_\infty$-conformal algebras and find their relations with $A_\infty$-conformal algebras.