English

AdS superprojectors

High Energy Physics - Theory 2021-04-28 v3

Abstract

Within the framework of N=1{\mathcal N}=1 anti-de Sitter (AdS) supersymmetry in four dimensions, we derive superspin projection operators (or superprojectors). For a tensor superfield Vα(m)α˙(n):=V(α1...αm)(α˙1...α˙n)\mathfrak{V}_{\alpha(m)\dot{\alpha} (n)} := \mathfrak{V}_{(\alpha_1...\alpha_m) (\dot \alpha_1...\dot \alpha_n)} on AdS superspace, with mm and nn non-negative integers, the corresponding superprojector turns Vα(m)α˙(n)\mathfrak{V}_{\alpha(m)\dot \alpha(n)} into a multiplet with the properties of a conserved conformal supercurrent. It is demonstrated that the poles of such superprojectors correspond to (partially) massless multiplets, and the associated gauge transformations are derived. We give a systematic discussion of how to realise the unitary and the partially massless representations of the N=1{\mathcal N}=1 AdS4{}_4 superalgebra osp(14)\mathfrak{osp} (1|4) in terms of on-shell superfields. As an example, we present an off-shell model for the massive gravitino multiplet in AdS4_4. We also prove that the gauge-invariant actions for superconformal higher-spin multiplets factorise into products of minimal second-order differential operators.

Keywords

Cite

@article{arxiv.2101.05524,
  title  = {AdS superprojectors},
  author = {E. I. Buchbinder and D. Hutchings and S. M. Kuzenko and M. Ponds},
  journal= {arXiv preprint arXiv:2101.05524},
  year   = {2021}
}

Comments

54 pages; V2: typos corrected, references, comments and conclusion added; V3: minor typos corrected

R2 v1 2026-06-23T22:09:28.732Z