On Pauli Reductions of Supergravities in Six and Five Dimensions

Abstract

The dimensional reduction of a generic theory on a curved internal space such as a sphere does not admit a consistent truncation to a finite set of fields that includes the Yang-Mills gauge bosons of the isometry group. In rare cases, for example the S7 reduction of eleven-dimensional supergravity, such a consistent "Pauli reduction" does exist. In this paper we study this existence question in two examples of S2 reductions of supergravities. We do this by making use of a relation between certain S2 reductions and group manifold S3=SU(2) reductions of a theory in one dimension higher. By this means we establish the non-existence of a consistent S2 Pauli reduction of five-dimensional minimal supergravity. We also show that a previously-discovered consistent Pauli reduction of six-dimensional Salam-Sezgin supergravity can be elegantly understood via a group-manifold reduction from seven dimensions.