English

A note on linearized "New Massive Gravity" in arbitrary dimensions

High Energy Physics - Theory 2013-04-17 v2

Abstract

By means of a triple master action we deduce here a linearized version of the "New Massive Gravity" (NMG) in arbitrary dimensions. The theory contains a 4th-order and a 2nd-order term in derivatives. The 4th-order term is invariant under a generalized Weyl symmetry. The action is formulated in terms of a traceless ημνΩμνρ=0\eta^{\mu\nu}\Omega_{\mu\nu\rho}=0 mixed symmetry tensor Ωμνρ=Ωμρν\Omega_{\mu\nu\rho}=-\Omega_{\mu\rho\nu} and corresponds to the massive Fierz-Pauli action with the replacement eμν=\pρΩμνρe_{\mu\nu}=\p^{\rho}\Omega_{\mu\nu\rho}. The linearized 3D and 4D NMG theories are recovered via the invertible maps Ωμνρ=ϵνρβhβμ\Omega_{\mu\nu\rho} = \epsilon_{\nu\rho}^{\quad\beta}h_{\beta\mu} and Ωμνρ=ϵνργδT[γδ]μ\Omega_{\mu\nu\rho} = \epsilon_{\nu\rho}^{\quad \gamma\delta}T_{[\gamma\delta]\mu} respectively. The properties hμν=hνμh_{\mu\nu}=h_{\nu\mu} and T[[γδ]μ]=0T_{[[\gamma\delta]\mu]}=0 follow from the traceless restriction. The equations of motion of the linearized NMG theory can be written as zero "curvature" conditions \pνTρμ\pρTνμ=0\p_{\nu}T_{\rho\mu} - \p_{\rho}T_{\nu\mu}=0 in arbitrary dimensions.

Keywords

Cite

@article{arxiv.1212.6753,
  title  = {A note on linearized "New Massive Gravity" in arbitrary dimensions},
  author = {D. Dalmazi and R. C. Santos},
  journal= {arXiv preprint arXiv:1212.6753},
  year   = {2013}
}

Comments

15 pages, no figures, few typos fixed, one more reference

R2 v1 2026-06-21T23:01:54.456Z