Asymptotic structure of three-dimensional Maxwell Chern-Simons gravity coupled to spin-3 fields

TL;DR

This paper investigates the asymptotic symmetries of three-dimensional Maxwell Chern-Simons gravity extended with spin-3 fields, revealing a higher-spin algebra structure and its relation to known conformal algebras.

Contribution

It introduces generalized boundary conditions and derives a higher-spin extension of the Maxwell BMS algebra, connecting it to a limit of multiple W3 algebras.

Findings

Derived a higher-spin extension of the Maxwell BMS3 algebra.

Showed the algebra as a limit of three W3 algebras with independent central charges.

Proposed generalized boundary conditions for flat higher-spin gravity.

Abstract

In this work we analyze the asymptotic symmetries of the three-dimensional Chern-Simons (CS) gravity theory for a higher spin extension of the so-called Maxwell algebra. We propose a generalized set of asymptotic boundary conditions for the aforementioned flat gravity theory and we show that the corresponding charge algebra defines a higher-spin extension of the $\mathfrak{max}$-$\mathfrak{bms}_{3}$ algebra, which in turn corresponds the asymptotic symmetries of the Maxwell CS gravity. We also show that the $\mathfrak{hs}_3\mathfrak{max}$-$\mathfrak{bms}_{3}$ algebra can alternatively be obtained as a vanishing cosmological constant limit of three copies of the $\mathcal{W}_3$ algebra, with three independent central charges.