An explicit realization of logarithmic modules for the vertex operator algebra Wp,p'

Abstract

By extending the methods used in our earlier work, in this paper, we present an explicit realization of logarithmic Wp,p'-modules that have L(0) nilpotent rank three. This was achieved by combining the techniques developed in AdM-2009 with the theory of local systems of vertex operators LL. In addition, we also construct a new type of extension of Wp,p', denoted by V. Our results confirm several claims in the physics literature regarding the structure of projective covers of certain irreducible representations in the principal block. This approach can be applied to other models defined via a pair screenings.