Yuly Billig
Published 2005-09-16, updated 2009-10-13Version 2
We introduce a category B of bounded modules for the toroidal Lie algebras and study irreducible modules in B. We show that one of the irreducible modules in this category, L(T_0), admits a structure of a vertex operator algebra. We prove that L(T_0) factors into a tensor product of a sub-VOA of a hyperbolic lattice VOA and a simple VOA associated with a twisted Virasoro-affine Lie algebra. Every irreducible module in category B is a VOA module for a slightly larger VOA V(T_0). Knowing the structure of V(T_0), we are able to give explicit realizations for all irreducible modules in category B and determine their characters.
Comments: Missing factor of 2 inserted in the Sugawara formulas (3.20), (3.21) and Theorem 5.4. Proofs are not affected
Bimodule and twisted representation of vertex operator algebras
Irreducible Integrable Modules for the full Toroidal Lie Algebras co-ordinated by Rational Quantum Torus
Representations of Toroidal and Full toroidal Lie algebras over polynomial algebras
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