A Generalised Garfinkle-Vachaspati Transform

Abstract

The Garfinkle-Vachaspati transform is a deformation of a metric in terms of a null, hypersurface orthogonal, Killing vector kμ. We explore a generalisation of this deformation in type IIB supergravity taking motivation from certain studies of the D1-D5 system. We consider solutions of minimal six-dimensional supergravity admitting null Killing vector kμ trivially lifted to type IIB supergravity by the addition of four-torus directions. The torus directions provide covariantly constant spacelike vectors lμ. We show that the original solution can be deformed as gμ gμ + 2 k(μl), Cμ Cμ - 2 k[μl], provided the two-form supporting the original spacetime satisfies ik (dC) = - d k, and where satisfies the equation of a minimal massless scalar field on the original spacetime. We show that the condition ik (dC) = - d k is satisfied by all supersymmetric solutions admitting null Killing vector. Hence all supersymmetric solutions of minimal six-dimensional supergravity can be deformed via this method. As an example of our approach, we work out the deformation on a class of D1-D5-P geometries with orbifolds. We show that the deformed spacetimes are smooth and identify their CFT description. Using Bena-Warner formalism, we also express the deformed solutions in other duality frames.