Field equations and Noether potentials for higher-order theories of gravity with Lagrangians involving i R, i Rμ and i Rμσ

Abstract

In this paper, we aim to perform a systematical investigation on the field equations and Noether potentials for the higher-order gravity theories endowed with Lagrangians depending on the metric and the Riemann curvature tensor, together with ith (i=1,2,···) powers of the Beltrami-d'Alembertian operator acting on the latter. We start with a detailed derivation of the field equations and the Noether potential corresponding to the Lagrangian -gLR(R, R,···,m R) through the direct variation of the Lagrangian and a method based upon the conserved current. Next the parallel analysis is extended to a more generic Lagrangian -gLRic(gμ, Rμ, Rμ, ···,m Rμ), as well as to the generalization of the Lagrangian -gLRic, which depends on the metric gμ, the Riemann tensor Rμσ and i Rμσs. Finally, all the results associated to the three types of Lagrangians are extended to the Lagrangian relying on an arbitrary tensor and the variables via i acting on such a tensor. In particular, we take into consideration of equations of motion and Noether potentials for nonlocal gravity models. For Lagrangians involving the variables i R, i Rμ and i Rμσ, our investigation provides their concrete Noether potentials and the field equations without the derivative of the Lagrangian density with respect to the metric. Besides, the Iyer-Wald potentials associated to these Lagrangians are also presented.