Vertex $F$-algebras and their $\phi$-coordinated modules

TL;DR

This paper generalizes vertex algebras using formal groups, introduces $ ext{phi}$-coordinated modules, and establishes categorical equivalences and connections with existing algebraic structures.

Contribution

It formulates vertex $F$-algebras for any one-dimensional formal group and links their modules to traditional vertex algebra modules.

Findings

Categorical isomorphism between vertex $F$-algebras and ordinary vertex algebras.

Complete classification of associates for formal groups.

Connection between $V$-modules and $ ext{phi}$-coordinate modules via Zhu's change-of-variables.

Abstract

In this paper, for every one-dimensional formal group $F$ we formulate and study a notion of vertex $F$-algebra and a notion of $\phi$-coordinated module for a vertex $F$-algebra where $\phi$ is what we call an associate of $F$. In the case that $F$ is the additive formal group, vertex $F$-algebras are exactly ordinary vertex algebras. We give a canonical isomorphism between the category of vertex $F$-algebras and the category of ordinary vertex algebras. Meanwhile, for every formal group we completely determine its associates. We also study $\phi$-coordinated modules for a general vertex $\Z$-graded algebra $V$ with $\phi$ specialized to a particular associate of the additive formal group and we give a canonical connection between $V$-modules and $\phi$-coordinate modules for a vertex algebra obtained from $V$ by Zhu's change-of-variables theorem.