The anti-de Sitter supergeometry revisited
Abstract
In a supergravity framework, the N-extended anti-de Sitter (AdS) superspace in four spacetime dimensions, AdS4|4 N , is a maximally symmetric background that is described by a curved superspace geometry with structure group SL(2, C) × U( N). On the other hand, within the group-theoretic setting, AdS4|4 N is realised as the coset superspace OSp( N|4;R) /[ SL(2, C) × O( N) ], with its structure group being SL(2, C) × O( N). Here we explain how the two frameworks are related. We give two explicit realisations of AdS4|4 N as a conformally flat superspace, thus extending the N=1 and N=2 results available in the literature. As applications, we describe: (i) a two-parameter deformation of the AdS4|4 N interval and the corresponding superparticle model; (ii) some implications of conformal flatness for superconformal higher-spin multiplets and an effective action generating the N=2 super-Weyl anomaly; and (iii) -symmetry of the massless AdS superparticle.
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