The free field realisation of the BVW string

Abstract

The symmetric orbifold of T4 was recently shown to be exactly dual to string theory on AdS3× S3 × T4 with minimal (k=1) NS-NS flux. The worldsheet theory is best formulated in terms of the hybrid formalism of Berkovits, Vafa & Witten (BVW), in terms of which the AdS3× S3 factor is described by a psu(1,1|2)k WZW model. At level k=1, psu(1,1|2)1 has a free field realisation that is obtained from that of u(1,1|2)1 upon setting a u(1) field, often called Z, to zero. We show that the free field version of the N=2 generators of BVW (whose cohomology defines the physical states) does not give rise to an N=2 algebra, but is rather contaminated by terms proportional to the Z-field. We also show how to overcome this problem by introducing additional ghost fields that implement the quotienting by Z.