BRST–BV approach for interacting higher-spin fields

We develop the BRST–BV approach to the construction of the general off-shell Lorentz covariant cubic, quartic, and -tic interaction vertices for irreducible higher-spin fields on -dimensional Minkowski space. We consider two different cases for interacting integer higher-spin fields with both massle...

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Bibliographic Details
Published in:Theoretical and mathematical physics 2023-10, Vol.217 (1), p.1505-1527
Main Author: Reshetnyak, A. A.
Format: Article
Language:English
Subjects:
14/34
639/766/189
639/766/530
639/766/747
Apexes
Applications of Mathematics
Gauge theory
Hilbert space
Integers
Mathematical and Computational Physics
Minkowski space
Operators (mathematics)
Physics
Physics and Astronomy
Scalars
Tensors
Theoretical
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Summary:We develop the BRST–BV approach to the construction of the general off-shell Lorentz covariant cubic, quartic, and -tic interaction vertices for irreducible higher-spin fields on -dimensional Minkowski space. We consider two different cases for interacting integer higher-spin fields with both massless and massive fields. The deformation procedure to find a minimal BRST–BV action for interacting higher-spin fields, defined with help of a generalized Hilbert space, is based on the preservation of the master equation in each power of the coupling constant starting from the Lagrangian formulation for a free gauge theory. For illustration, we consider the construction of local cubic vertices for irreducible massless fields of integer helicities, and massless fields and one massive field of spins . For a triple of two massless scalars and a tensor field of integer spin, the BRST–BV action with cubic interaction is explicitly found. In contrast to the previous results on cubic vertices, following our results for the BRST approach to massless fields, we use a single BRST–BV action instead of the classical action with reducible gauge transformations. The procedure is based on the complete BRST operator that includes the trace constraints used in defining the irreducible representation with a definite integer spin.
ISSN:0040-5779
1573-9333
DOI:10.1134/S0040577923100070