The Conformal Penrose Limit and the Resolution of the pp-curvature Singularities
Abstract
We consider the exact solutions of the supergravity theories in various dimensions in which the space-time has the form Md x SD-d where Md is an Einstein space admitting a conformal Killing vector and SD-d is a sphere of an appropriate dimension. We show that, if the cosmological constant of Md is negative and the conformal Killing vector is space-like, then such solutions will have a conformal Penrose limit: M(0)d x SD-d where M(0)d is a generalized d-dimensional AdS plane wave. We study the properties of the limiting solutions and find that M(0)d has 1/4 supersymmetry as well as a Virasoro symmetry. We also describe how the pp-curvature singularity of M(0)d is resolved in the particular case of the D6-branes of D=10 type IIA supergravity theory. This distinguished case provides an interesting generalization of the plane waves in D=11 supergravity theory and suggests a duality between the SU(2) gauged d=8 supergravity of Salam and Sezgin on M(0)8 and the d=7 ungauged supergravity theory on its pp-wave boundary.
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