English

Irreducible Virasoro modules from tensor products

Representation Theory 2019-08-09 v1 Rings and Algebras

Abstract

In this paper, we obtain a class of irreducible Virasoro modules by taking tensor products of the irreducible Virasoro modules Ω(λ,b)\Omega(\lambda,b) defined in [LZ], with irreducible highest weight modules V(θ,h)V(\theta,h) or with irreducible Virasoro modules Indθ(N)_{\theta}(N) defined in [MZ2]. We determine the necessary and sufficient conditions for two such irreducible tensor products to be isomorphic. Then we prove that the tensor product of Ω(λ,b)\Omega(\lambda,b) with a classical Whittaker module is isomorphic to the module Indθ,λ(Cm)\mathrm{Ind}_{\theta,\lambda}(\mathbb{C_\mathbf{m}}) defined in [MW]. As a by-product we obtain the necessary and sufficient conditions for the module Indθ,λ(Cm)\mathrm{Ind}_{\theta, \lambda}(\mathbb{C_\mathbf{m}}) to be irreducible. We also generalize the module Indθ,λ(Cm)\mathrm{Ind}_{\theta, \lambda}(\mathbb{C_\mathbf{m}}) to Indθ,λ(Bs(n))\mathrm{Ind}_{\theta,\lambda}(\mathcal{B}^{(n)}_{\mathbf{s}}) for any non-negative integer n n and use the above results to completely determine when the modules Indθ,λ(Bs(n))\mathrm{Ind}_{\theta,\lambda}(\mathcal{B}^{(n)}_{\mathbf{s}}) are irreducible. The submodules of Indθ,λ(Bs(n))\mathrm{Ind}_{\theta,\lambda}(\mathcal{B}^{(n)}_{\mathbf{s}}) are studied and an open problem in [GLZ] is solved. Feigin-Fuchs' Theorem on singular vectors of Verma modules over the Virasoro algebra is crucial to our proofs in this paper.

Keywords

Cite

@article{arxiv.1301.2131,
  title  = {Irreducible Virasoro modules from tensor products},
  author = {Haijun Tan and Kaiming Zhao},
  journal= {arXiv preprint arXiv:1301.2131},
  year   = {2019}
}

Comments

17 Pages

R2 v1 2026-06-21T23:07:10.746Z