Massive N=2 Supergravity in Three Dimensions

Abstract

There exists two distinct off-shell N=2 supergravities in three dimensions. They are also referred to as N=(1,1) and N=(2,0) supergravities, and they arise from the coupling of the Weyl multiplet to a compensating scalar or vector multiplet, respectively, followed by fixing of conformal symmetries. The N =(p,q) terminology refers to the underlying anti-de Sitter superalgebras OSp(2,p) OSp(2,q) with R-symmetry group SO(p) × SO(q). We construct off-shell invariants of these theories up to fourth order in derivatives. As an application of these results, we determine the special combinations of the N=(1,1) invariants that admit anti-de Sitter vacuum solution about which there is a ghost-free massive spin-2 multiplet of propagating modes. We also show that the N=(2,0) invariants do not allow such possibility.