More on (gauged) WZW models over low-dimensional Lie supergroups and their integrable deformations

Abstract

In superdimension (2|2) there are only three non-Abelian Lie superalgebras admitting non-degenerate ad-invariant supersymmetric metric, the well-known Lie superalgebra gl(1|1), and two more, (3 + ) and (05 +). After a brief review of the construction of the Wess-Zumino-Witten (WZW) models based on the GL(1|1) and (C3 + A) Lie supergroups, we proceed to construct the WZW model on the (C05 +A) Lie supergroup. Unfortunately, this model does not include the super Poisson-Lie symmetry. In the following, three new exact conformal field theories of the WZW type are constructed by gauging an anomaly-free subgroup SO(2) of the Lie supergroups mentioned above. The most interesting indication of this work is that the gauged WZW model on the supercoset (C3 + A)/SO(2) has super Poisson-Lie symmetry; most importantly, its dual model is conformally invariant at the one-loop order, and this is presented here for the first time. Finally, in order to study the Yang-Baxter (YB) deformations of the (C05 +A) WZW model we obtain the inequivalent solutions of the (modified) graded classical Yang-Baxter equation ((m)GCYBE) for the (05 +) Lie superalgebra. Then, we classify all possible YB deformations for the (C05 +A) and settle also the issue of an one-loop conformality of the deformed backgrounds. The classification results are important, in particular in the Lie supergroup case they are rare, much hard technical work was needed to obtain them.

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