Asymptotic symmetries of three-dimensional higher-spin gravity: the metric approach

[en] The asymptotic structure of three-dimensional higher-spin anti-de Sitter gravity is analyzed in the metric approach, in which the fields are described by completely symmetric tensors and the dynamics is determined by the standard Einstein-Fronsdal action improved by higher order terms that secure gauge invariance. Precise boundary conditions are given on the fields. The asymptotic symmetries are computed and shown to form a non-linear W-algebra, in complete agreement with what was found in the Chern-Simons formulation. The W-symmetry generators are two-dimensional traceless and divergenceless rank-s symmetric tensor densities of weight s (s = 2, 3, ...), while asymptotic symmetries emerge at infinity through the conformal Killing vector and conformal Killing tensor equations on the two-dimensional boundary, the solution space of which is infinite-dimensional. For definiteness, only the spin 3 and spin 4 cases are considered, but these illustrate the features of the general case: emergence of the W-extended conformal structure, importance of the improvement terms in the action that maintain gauge invariance, necessity of the higher spin gauge transformations of the metric, role of field redefinitions.

Disciplines :

Physics

Author, co-author :

Campoleoni, Andrea

Henneaux, Marc

Language :

English

Title :

Asymptotic symmetries of three-dimensional higher-spin gravity: the metric approach

Publication date :

26 March 2015

Journal title :

Journal of High Energy Physics

ISSN :

1126-6708

Publisher :

Springer, Heidelberg, Germany

Volume :

1503

Issue :

143

Pages :

1-62

Peer reviewed :

Peer Reviewed verified by ORBi

Available on ORBi UMONS :

since 04 December 2016

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