Duality invariant class of exact string backgrounds
Abstract
We consider a class of 2+D - dimensional string backgrounds with a target space metric having a covariantly constant null Killing vector and flat `transverse' part. The corresponding sigma models are invariant under D abelian isometries and are transformed by O(D,D) duality into models belonging to the same class. The leading-order solutions of the conformal invariance equations (metric, antisymmetric tensor and dilaton), as well as the action of O(D,D) duality transformations on them, are exact, i.e. are not modified by '-corrections. This makes a discussion of different space-time representations of the same string solution (related by O(D,D|Z) duality subgroup) rather explicit. We show that the O(D,D) duality may connect curved 2+D-dimensional backgrounds with solutions having flat metric but, in general, non-trivial antisymmetric tensor and dilaton. We discuss several particular examples including the 2+D=4 - dimensional background that was recently interpreted in terms of a WZW model.
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