Anti-de Sitter flag superspace

Abstract

This work aims to develop a global formulation for N=2 harmonic/projective anti-de Sitter (AdS) superspace AdS4|8× S2 AdS4|8× CP1 that allows for a simple action of superconformal (and hence AdS isometry) transformations. First of all, we provide an alternative supertwistor description of the N-extended AdS superspace in four dimensions, AdS4|4 N, which corresponds to a realisation of the connected component OSp0( N|4; R) of the AdS isometry supergroup as SU(2,2 | N) OSp ( N| 4; C). The proposed realisation yields the following properties: (i) AdS4|4 N is an open domain of the compactified N-extended Minkowski superspace, M4|4 N; (ii) the infinitesimal N-extended superconformal transformations naturally act on AdS4|4 N; and (iii) the isometry transformations of AdS4|4 N are described by those superconformal transformations which obey a certain constraint. The obtained results for AdS4|4 N are then applied to develop a supertwistor formulation for an AdS flag superspace AdS4|8 × F1(2) that we identify with the N=2 harmonic/projective AdS superspace. This construction makes it possible to read off the superconformal and AdS isometry transformations acting on the analytic subspace of the harmonic superspace.

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