English

Regular representations and $A_{n}(V)$-$A_{m}(V)$ bimodules

Quantum Algebra 2022-05-12 v1

Abstract

This paper is to establish a natural connection between regular representations for a vertex operator algebra VV and An(V)A_{n}(V)-Am(V)A_{m}(V) bimodules of Dong and Jiang. Let WW be a weak VV-module and let (m,n)(m,n) be a pair of nonnegative integers. We study two quotient spaces An,m(W)A_{n,m}^{\dagger}(W) and An,m(W)A^{\diamond}_{n,m}(W) of WW. It is proved that the dual space An,m(W)A^{\dagger}_{n,m}(W)^{*} viewed as a subspace of WW^* coincides with the level-(m,n)(m,n) vacuum subspace of the regular representation module D(1)(W)\mathfrak{D}_{(-1)}(W). By making use of this connection, we obtain an An(V)A_{n}(V)-Am(V)A_m(V) bimodule structure on both An,m(W)A_{n,m}^{\dagger}(W) and An,m(W)A^{\diamond}_{n,m}(W). Furthermore, we obtain an N\N-graded weak VV-module structure together with a commuting right Am(V)A_m(V)-module structure on A,m(W):=nNAn,m(W)A^{\diamond}_{\Box,m}(W):=\oplus_{n\in \N}A^{\diamond}_{n,m}(W). Consequently, we recover the corresponding results and roughly confirm a conjecture of Dong and Jiang.

Cite

@article{arxiv.2205.05481,
  title  = {Regular representations and $A_{n}(V)$-$A_{m}(V)$ bimodules},
  author = {Haisheng Li},
  journal= {arXiv preprint arXiv:2205.05481},
  year   = {2022}
}

Comments

28 pages

R2 v1 2026-06-24T11:14:14.784Z