The Post-Newtonian Limit of f(R)-gravity in the Harmonic Gauge

Abstract

A general analytic procedure is developed for the post-Newtonian limit of f(R)-gravity with metric approach in the Jordan frame by using the harmonic gauge condition. In a pure perturbative framework and by using the Green function method a general scheme of solutions up to (v/c)4 order is shown. Considering the Taylor expansion of a generic function f it is possible to parameterize the solutions by derivatives of f. At Newtonian order, (v/c)2, all more important topics about the Gauss and Birkhoff theorem are discussed. The corrections to "standard" gravitational potential (tt-component of metric tensor) generated by an extended uniform mass ball-like source are calculated up to (v/c)4 order. The corrections, Yukawa and oscillating-like, are found inside and outside the mass distribution. At last when the limit f→ R is considered the f(R)-gravity converges in General Relativity at level of Lagrangian, field equations and their solutions.