English

Covariant Cubic Interacting Vertices for Massless and Massive Integer Higher Spin Fields

High Energy Physics - Theory 2024-09-04 v8 Mathematical Physics Dynamical Systems math.MP

Abstract

We develop the BRST approach to construct the general off-shell local Lorentz covariant cubic interaction vertices for irreducible massless and massive higher spin fields on dd-dimensional Minkowski space. We consider two different cases for interacting higher spin fields: with one massive and two massless; with two massive both with coinciding and with different masses and one massless fields of spins s1,s2,s3s_1, s_2, s_3. Unlike the previous results on cubic vertices we extend our earlier result in [arXiv:2105.12030[hep-th]] for massless fields and employ the complete BRST operator, including the trace constraints that is used to formulate an irreducible representation with definite integer spin. We generalize the cubic vertices proposed for reducible higher spin fields in [arXiv:1205.3131 [hep-th]] in the form of multiplicative and non-multiplicative BRST-closed constituents and calculate the new contributions to the vertex, which contain additional terms with a smaller number space-time derivatives of the fields. We prove that without traceless conditions for the cubic vertices in [arXiv:1205.3131 [hep-th]] it is impossible to provide the noncontradictory Lagrangian dynamics and find explicit traceless solution for these vertices. As the examples, we explicitly construct the interacting Lagrangian for the massive of spin ss field and massless scalars both with and without auxiliary fields. The interacting models with different combinations of triples higher spin fields: massive of spin ss with massless scalar and vector fields and with two vector fields; massless of helicity λ\lambda with massless scalar and massive vector fields; two massive fields of spins s,0s, 0 and massless scalar are also considered.

Keywords

Cite

@article{arxiv.2212.07097,
  title  = {Covariant Cubic Interacting Vertices for Massless and Massive Integer Higher Spin Fields},
  author = {Ioseph L. Buchbinder and Alexander A. Reshetnyak},
  journal= {arXiv preprint arXiv:2212.07097},
  year   = {2024}
}

Comments

49 pages; 3 figures; minor corrections; published version

R2 v1 2026-06-28T07:33:57.697Z