Exact conformal field theories from mutually T-dualizable σ-models

Abstract

Exact conformal field theories (CFTs) are obtained by using the approach of Poisson-Lie (PL) T-duality in the presence of spectators. We explicitly construct some non-Abelian T-dual σ-models (here as the PL T-duality on a semi-Abelian double) on 2+2-dimensional target manifolds M ≈ O × G and M ≈ O × G, where G and G as two-dimensional real non-Abelian and Abelian Lie groups act freely on M and M, respectively, while O is the orbit of G in M. The findings of our study show that the original models are equivalent to Wess-Zumino-Witten (WZW) models based on the Heisenberg (H4) and GL(2,R) Lie groups. In this way, some new T-dual backgrounds for these WZW models are obtained. For one of the duals of the H4 WZW model, we show that the model is self-dual. In the case of the GL(2,R) WZW model it is observed that the duality transformation changes the asymptotic behavior of solutions from AdS3 × R to flat space. Then, the structure and asymptotic nature of the dual spacetime of this model including the horizon and singularity are determined. We furthermore get the non-critical Bianchi type III string cosmological model with a non-vanishing field strength from T-dualizable σ-models and show that this model describes an exact CFT (equivalent to the GL(2,R) WZW model). After that, the conformal invariance of T-dual models up to two-loop order (first order in α') is discussed.