Vertex operator representation of some quantum tori Lie algebras

We study the representation theory of code vertex operator algebras M D Ž . VOAs constructed from an even binary linear code D. Our main purpose is to study, using the representation theory of M , the structure of VOA V containing a D 1 set of mutually orthogonal rational conformal vectors with cent

We study the twisted representations of code vertex operator algebras. For any inner automorphism g of a code VOA M , we compute the g-twisted modules of D M by using the theory of induced modules. We also show that M is g-rational if g is an inner automorphism.

In this note, we give the dimensions of some irreducible representations of exceptional Lie algebras and algebraic groups. Similar results appear in [1] for classical groups and algebras of rank at most 4. These results were produced by computer programs developed in connection with [3], where the m

We give a natural extension of the notion of the contragredient module for a vertex operator algebra. By using this extension we prove that for regular vertex Ž operator algebras, Zhu's C -finiteness condition holds, fusion rules for any three 2 . irreducible modules are finite and the vertex operat