Vertex algebras and TKK algebras

Abstract

In this paper, we associate the TKK algebra G(J) with vertex algebras through twisted modules. Firstly, we prove that for any complex number , the category of restricted G(J)-modules of level is canonically isomorphic to the category of σ-twisted VC g(,0)-modules, where VC g(,0) is a vertex algebra arising from the toroidal Lie algebra of type C2 and σ is an isomorphism of VC g(,0) induced from the involution of this toroidal Lie algebra. Secondly, we prove that for any nonnegative integer , the integrable restricted G(J)-modules of level are exactly the σ-twisted modules for the quotient vertex algebra LC g(,0) of VC g(,0). Finally, we classify the irreducible 12N-graded σ-twisted LC g(,0)-modules.