Vertex Operator Algebras Associated to Type G Affine Lie Algebras II

Abstract

We continue the study of the vertex operator algebra L(k,0) associated to a type G2(1) affine Lie algebra at admissible one-third integer levels, k = -2 + m + i3\ (m∈ Z 0, i = 1,2), initiated in AL. Our main result is that there is a finite number of irreducible L(k,0)-modules from the category O. The proof relies on the knowledge of an explicit formula for the singular vectors. After obtaining this formula, we are able to show that there are only finitely many irreducible A(L(k,0))-modules form the category O. The main result then follows from the bijective correspondence in A(V)-theory.