Constraints on f(RijklRijkl) gravity: An evidence against the covariant resolution of the Pioneer anomaly

Abstract

We consider corrections in the form of L(RijklRijkl) to the Einstein-Hilbert Lagrangian. Then we compute the corrections to the Schwarszchild geometry due to the inclusion of this general term to the Lagrangian. We show that L3=α1/3(RijklRijkl)1/3 gives rise to a constant anomalous acceleration for objects orbiting the Sun onward the Sun. This leads to the conclusion that α1/3=(13.91 2.11) × 10-26(1meters)2/3 would have covariantly resolved the Pioneer anomaly if this value of α1/3 had not contradicted other observations. We notice that the experimental bounds on L3 grows stronger in case we examine the deformation of the space-time geometry around objects lighter than the Sun. We therefore use the high precision measurements around the Earth (LAGEOS and LLR) and obtain a very strong constraint on the corrections in the form of L(RijklRijkl) and in particular L=αn(RijklRijkl)n. This bound requires α1/3≤6.12× 10-29(1meters)2/3. Therefore it refutes the covariant resolution of the Pioneer anomaly.