On equivalence of gauge-invariant models for massive integer-spin fields

Abstract

There are several approaches to formulate gauge-invariant models for massive integer-spin fields in d dimensions including the following: (i) in terms of symmetric tensor fields φμ1 … μk , with k = s, s-1, … , 0, restricted to be double traceless for k≥ 4; and (ii) in terms of a quartet of traceful symmetric tensor fields μ1 … μk , of rank k=s,s-1,s-2, s-3. We demonstrate that these formulations in Minkowski space Md are equivalent to the gauge-invariant theory for a massive integer-spin field proposed in 1989 by Pashnev. We also make use of the Klishevich-Zinoviev theory in Md to derive a unique generalisation of the Singh-Hagen model for a massive integer-spin field in d>4 dimensions.

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