English

On higher-spin ${\mathcal{N}=2}$ supercurrent multiplets

High Energy Physics - Theory 2023-05-24 v3

Abstract

We elaborate on the structure of higher-spin N=2\mathcal{N}=2 supercurrent multiplets in four dimensions. It is shown that associated with every conformal supercurrent Jα(m)α˙(n)J_{\alpha(m) \dot{\alpha}(n)} (with m,nm,n non-negative integers) is a descendant Jα(m+1)α˙(n+1)ijJ^{ij}_{\alpha(m+1) \dot{\alpha}(n+1)} with the following properties: (a) it is a linear multiplet with respect to its SU(2)\mathsf{SU}(2) indices, that is Dβ(iJα(m+1)α˙(n+1)jk)=0 D_\beta^{(i} J^{ jk)}_{\alpha(m+1) \dot{\alpha}(n+1) }=0 and Dˉβ˙(iJα(m+1)α˙(n+1)jk)=0 \bar D_{\dot \beta}^{(i} J^{jk)}_{ \alpha(m+1) \dot{\alpha}(n+1) }=0; and (b) it is conserved, ββ˙Jβα(m)β˙α˙(n)ij=0\partial^{\beta \dot{\beta}} J^{ij}_{\beta \alpha(m) \dot{\beta} \dot{\alpha}(n)}=0. Realisations of the conformal supercurrents Jα(s)α˙(s)J_{\alpha(s) \dot{\alpha}(s)}, with s=0,1,s=0,1, \dots, are naturally provided by a massless hypermultiplet and a vector multiplet. It turns out that such supercurrents and their linear descendants Jα(s+1)α˙(s+1)ijJ^{ij}_{\alpha(s+1) \dot{\alpha}(s+1)} do not occur in the harmonic-superspace framework recently described in arXiv:2212.14114. Making use of a massive hypermultiplet, we derive non-conformal higher-spin N=2\mathcal{N}=2 supercurrent multiplets. Additionally, we derive the higher symmetries of the kinetic operators for both a massive and massless hypermultiplet. Building on this analysis, we sketch the construction of higher-derivative gauge transformations for the off-shell arctic multiplet Υ(1)\Upsilon^{(1)}, which are expected to be vital in the framework of consistent interactions between Υ(1)\Upsilon^{(1)} and superconformal higher-spin gauge multiplets.

Keywords

Cite

@article{arxiv.2301.09386,
  title  = {On higher-spin ${\mathcal{N}=2}$ supercurrent multiplets},
  author = {Sergei M. Kuzenko and Emmanouil S. N. Raptakis},
  journal= {arXiv preprint arXiv:2301.09386},
  year   = {2023}
}

Comments

23 pages; V2: comments, references and a new appendix added; V3: published version

R2 v1 2026-06-28T08:17:43.222Z