Harmonic forms on asymptotically AdS metrics

Abstract

In this paper we study the rotationally invariant harmonic cohomology of a 2-parameter family of Einstein metrics g which admits a cohomogeneity one action of SU (2) × U (1) and has AdS asymptotics. Depending on the values of the parameters, g is either of NUT type, if the fixed-point locus of the U (1) action is 0-dimensional, or of bolt type, if it is 2-dimensional. We find that if g is of NUT type then the space of SU (2) -invariant harmonic 2-forms is 3-dimensional and consists entirely of self-dual forms; if g is of bolt type it is 4-dimensional. In both cases we explicitly determine a basis. The pair (g,F) for F a self-dual harmonic 2-form is also a solution of the bosonic sector of 4D supergravity. We determine for which choices it is a supersymmetric solution and the amount of preserved supersymmetry.