The $\sigma_-$ Cohomology Analysis for Coxeter HS $B_2$ model

A.A. Tarusov; K.A. Ushakov

arXiv:2602.10788·hep-th·February 12, 2026

The $\sigma_-$ Cohomology Analysis for Coxeter HS $B_2$ model

A.A. Tarusov, K.A. Ushakov

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TL;DR

This paper analyzes the $\sigma_-$-cohomology in the $B_2$ Coxeter model within $AdS_4$, classifying primary fields and gauge operators, revealing how one-forms encode various massless and partially massless fields.

Contribution

It provides a detailed classification of primary fields and gauge-invariant operators in the $B_2$ Coxeter theory, highlighting the encoding of massless and partially massless fields in one-forms.

Findings

01

One-forms encode symmetric massless and partially massless fields.

02

Classification of primary fields and gauge operators in the $B_2$ model.

03

Analysis of gluing of modules at linear vertices.

Abstract

The dynamical content of equations resulting from rank-two covariant derivatives in $B_{2}$ Coxeter theory in $A d S_{4}$ are analyzed in terms of $σ_{-}$ -complexes. Primary fields and gauge-invariant differential operators on primary fields are classified for $(a d j \otimes a d j)$ one-form fields $ω$ and $(tw \otimes a d j)$ zero-form fields $C$ . It is shown that one-forms $ω$ in the $(a d j \otimes a d j)$ sector encode symmetric massless fields and partially massless fields of all spins and depth of masslessness. Gluing of the one-form module to the zero-form modules at the linear vertices is studied.

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Taxonomy

TopicsBlack Holes and Theoretical Physics · Algebraic structures and combinatorial models · Homotopy and Cohomology in Algebraic Topology