Vertex operator algebras and irreducibility of certain modules for affine Lie algebras

We find the connection between the representation theory of vertex operator algebra L(k Lambda(0)) and the irreducibility of tensor products <(V(mu))over bar>xL(k Lambda(0)). In the case of affine Lie algebra A(1)((1)), on every admissible rational level we construct a family of irreducible modules having infinite-dimensional weight spaces.