English

N=2 supergravity and supercurrents

High Energy Physics - Theory 2011-01-27 v2

Abstract

We address the problem of classifying all N=2 supercurrent multiplets in four space-time dimensions. For this purpose we consider the minimal formulation of N=2 Poincare supergravity with a tensor compensator, and derive its linearized action in terms of three N=2 off-shell multiplets: an unconstrained scalar superfield, a vector multiplet, and a tensor multiplet. Such an action was ruled out to exist in the past. Using the action constructed, one can derive other models for linearized N=2 supergravity by applying N=2 superfield duality transformations. The action depends parametrically on a constant non-vanishing real isotriplet g^{ij}=g^{ji} which originates as an expectation value of the tensor compensator. Upon reduction to N=1 superfields, we show that the model describes two dually equivalent formulations for the massless multiplet (1,3/2)+(3/2,2) depending on a choice of g^{ij}. In the case g^{11}=g^{22}=0, the action describes (i) new minimal N=1 supergravity; and (ii) the Fradkin-Vasiliev-de Wit-van Holten gravitino multiplet. In the case g^{12}=0, on the other hand, the action describes (i) old minimal N=1 supergravity; and (ii) the Ogievetsky-Sokatchev gravitino multiplet.

Keywords

Cite

@article{arxiv.1011.0339,
  title  = {N=2 supergravity and supercurrents},
  author = {Daniel Butter and Sergei M. Kuzenko},
  journal= {arXiv preprint arXiv:1011.0339},
  year   = {2011}
}

Comments

40 pages; v2: added references, some comments, new appendix

R2 v1 2026-06-21T16:37:07.284Z