Lovelock black p-branes with fluxes

Abstract

In this paper we construct compactifications of generic, higher curvature Lovelock theories of gravity over direct product spaces of the type MD=Md × Sp , with D=d+p and d5, where Sp represents an internal, Euclidean manifold of positive constant curvature. We show that this can be accomplished by including suitable non-minimally coupled p-1-form fields with a field strength proportional to the volume form of the internal space. We provide explicit details of this constructions for the Einstein-Gauss-Bonnet theory in d+2 and d+3 dimensions by using one and two-form fundamental fields, and provide as well the formulae that allows to construct the same family of compactification in any Lovelock theory from dimension d+p to dimension d. These fluxed compactifications lead to an effective Lovelock theory on the compactfied manifold, allowing therefore to find, in the Einstein-Gauss-Bonnet case, black holes in the Boulware-Deser family.