Structure of N = 2 superfield higher-spin abelian cubic interactions

Abstract

In this article we study the structure of the N=2 abelian higher-spin cubic (s1, s2, s2) vertices and the corresponding N=2 higher-spin supercurrents, introduced in arXiv:2408.00668. These interactions are possible only for s1 ≥ 2 s2. Conserved supercurrents are constructed as descendants of the principal supercurrent, which is uniquely characterized by simple differential conditions and admits an explicit representation in terms of N=2 higher-spin super-Weyl tensors. We derive the analytic form of the abelian vertices and identify the corresponding analytic higher-spin N=2 supercurrents. We show that the vertex structure is fully determined by the analytic supercurrents J++α(s-1)α(s-1), J+α(s-1)α(s-2), and J+α(s-2)α(s-1). The analytic form of the vertices provides a simple framework for analyzing their component structure. As an example, we explore the component content of such interactions on the Bel--Robinson diagonal. Using the superfield inverse Noether procedure, we study higher-spin gauge transformations for the N=2 vector multiplet associated with the (s, 1, 1) interaction. In the rigid limit, for odd s these transformations reduce to the N=2 superspace generalization of zilch-type higher-spin symmetries.