General properties of f(R) gravity vacuum solutions

Abstract

General properties of vacuum solutions of f(R) gravity are obtained by the condition that the divergence of the Weyl tensor is zero and f''≠ 0. Specifically, a theorem states that the gradient of the curvature scalar, ∇ R, is an eigenvector of the Ricci tensor and, if it is time-like, the space-time is a Generalized Friedman-Robertson-Walker metric; in dimension four, it is Friedman-Robertson-Walker.