English

On abelian generalized vertex algebras

Quantum Algebra 2007-05-23 v2 High Energy Physics - Theory

Abstract

This paper studies the algebraic aspect of a general abelian coset theory with a work of Dong and Lepowsky as our main motivation. It is proved that the vacuum space ΩV\Omega_{V} (or the space of highest weight vectors) of a Heisenberg algebra in a general vertex operator algebra VV has a natural generalized vertex algebra structure in the sense of Dong and Lepowsky and that the vacuum space ΩW\Omega_{W} of a VV-module WW is a natural ΩV\Omega_{V}-module. The automorphism group \AutΩVΩV\Aut_{\Omega_{V}}\Omega_{V} of the adjoint ΩV\Omega_{V}-module is studied and it is proved to be a central extension of a certain torsion free abelian group by \C×\C^{\times}. For certain subgroups AA of \AutΩVΩV\Aut_{\Omega_{V}}\Omega_{V}, certain quotient algebras ΩVA\Omega_{V}^{A} of ΩV\Omega_{V} are constructed. Furthermore, certain functors among the category of VV-modules, the category of ΩV\Omega_{V}-modules and the category of ΩVA\Omega_{V}^{A}-modules are constructed and irreducible ΩV\Omega_{V}-modules and ΩVA\Omega_{V}^{A}-modules are classified in terms of irreducible VV-modules. If the category of VV-modules is semisimple, then it is proved that the category of ΩVA\Omega_{V}^{A}-modules is semisimple.

Keywords

Cite

@article{arxiv.math/0008062,
  title  = {On abelian generalized vertex algebras},
  author = {Haisheng Li},
  journal= {arXiv preprint arXiv:math/0008062},
  year   = {2007}
}

Comments

Minor changes, the final version to appear in Communications in Contemporary Mathematics