Spin-Locality of $\eta^2$ and $\bar\eta^2$ Quartic Higher-Spin Vertices

V.E. Didenko; O.A. Gelfond; A.V. Korybut; M.A. Vasiliev

arXiv:2009.02811·hep-th·January 13, 2021

Spin-Locality of $\eta^2$ and $\bar\eta^2$ Quartic Higher-Spin Vertices

V.E. Didenko, O.A. Gelfond, A.V. Korybut, M.A. Vasiliev

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TL;DR

This paper demonstrates that specific higher-spin vertices related to the $ ext{eta}^2$ and $ar{ ext{eta}}^2$ sectors are spin-local, including parts of the scalar $ ext{phi}^4$ vertex, using the $Z$-dominance lemma.

Contribution

It shows that the third-order contribution to the zero-form admits a $Z$-dominated form leading to spin-local vertices in the $ ext{eta}^2$ and $ar{ ext{eta}}^2$ sectors.

Findings

01

Vertices in $ ext{eta}^2$ and $ar{ ext{eta}}^2$ sectors are spin-local.

02

Includes $ ext{phi}^4$ scalar field vertex parts.

03

Uses $Z$-dominance lemma to control spin-locality.

Abstract

Higher-spin theory contains a complex coupling parameter $η$ . Different higher-spin vertices are associated with different powers of $η$ and its complex conjugate $\overset{η}{ˉ}$ . Using $Z$ -dominance Lemma, that controls spin-locality of the higher-spin equations, we show that the third-order contribution to the zero-form $B (Z; Y; K)$ admits a $Z$ -dominated form that leads to spin-local vertices in the $η^{2}$ and $\overset{η}{ˉ}^{2}$ sectors of the higher-spin equations. These vertices include, in particular, the $η^{2}$ and $\overset{η}{ˉ}^{2}$ parts of the $ϕ^{4}$ scalar field vertex.

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