Decreasing filtrations, $C_{2}$-algebra and twisted modules

TL;DR

This paper explores the relationship between $C_{2}$-algebras and twisted modules in vertex algebras, establishing new connections and implications for cofiniteness and module generation.

Contribution

It introduces decreasing sequences of subspaces for twisted modules, linking $C_{2}$-cofiniteness to $C_{n}$-cofiniteness and analyzing module generation.

Findings

$C_{2}$-cofiniteness implies $C_{n}$-cofiniteness for all $n\, extgreater=2$

Established a connection between two types of decreasing subspace sequences

Provided tools for studying generating subspaces of twisted modules

Abstract

We investigate a question posed by Gaberdiel and Gannon concerning the relationship between $C_{2}$-algebras and twisted modules. To each twisted module $W$ of a vertex algebra $V$, we first associate a decreasing sequence of subspaces $\{E_{n}^{T}(W)\}_{n\in\mathbb{Z}}$ and demonstrate that the associated graded vector space $\mathrm{gr}_{\mathcal{E}}^{T}(W)$ is a twisted module of vertex Poisson algebra $\mathrm{gr}_{\mathcal{E}}^{T}(V)$. We introduce another decreasing sequence of subspace $\{C_{n}^{T}(W)\}_{n\in\mathbb{Z}_{\geq2}}$ and establish a connection between $\{E_{n}^{T}(W)\}_{n\in\mathbb{Z}}$ and $\{C_{n}^{T}(W)\}_{n\in\mathbb{Z}_{\geq2}}$. By utilizing the twisted module $\mathrm{gr}_{\mathcal{E}}^{T}(W)$ of vertex Poisson algebra $\mathrm{gr}_{\mathcal{E}}^{T}(V)$, we prove that for any twisted module $W$ of a vertex algebra $V$, $C_{2}$-cofiniteness implies $C_{n}$-cofiniteness for all $n\geq 2$. Furthermore, we employ $\mathrm{gr}_{\mathcal{E}}^{T}(W)$ to study generating subspaces of $\frac{1}{T}\mathbb{N}$-graded twisted modules of lower truncated $\mathbb{Z}$-graded vertex algebras.