Structure constants of shs$[\lambda]$: the deformed-oscillator point of view

TL;DR

This paper derives explicit structure constants for the super higher spin algebra shs[λ] using deformed oscillator techniques, confirming their form aligns with previous conjectures by Pope, Romans, and Shen.

Contribution

It provides a detailed derivation of the structure constants of shs[λ] via deformed oscillators, establishing their recurrence relations and confirming their form with known results.

Findings

Derived explicit structure constants for shs[λ]

Established recurrence relations from associativity

Confirmed constants match previous conjectures

Abstract

We derive and spell out the structure constants of the $\mathbb{Z}_2$-graded algebra $\mathfrak{shs}[\lambda]\,$ by using deformed-oscillators techniques in $Aq(2;\nu)\,$, the universal enveloping algebra of the Wigner-deformed Heisenberg algebra in 2 dimensions. The use of Weyl ordering of the deformed oscillators is made throughout the paper, via the symbols of the operators and the corresponding associative, non-commutative star product. The deformed oscillator construction was used by Vasiliev in order to construct the higher spin algebras in three spacetime dimensions. We derive an expression for the structure constants of $\mathfrak{shs}[\lambda]\,$ and show that they must obey a recurrence relation as a consequence of the associativity of the star product. We solve this condition and show that the $\mathfrak{hs}[\lambda]\,$ structure constants are given by those postulated by Pope, Romans and Shen for the Lone Star product.