Two Theorems on Flat Space-Time Gravitational Theories

Abstract

The first theorem states that all flat space-time gravitational theories must have a Lagrangian with a first term that is an homogeneous (degree-I) function of the 4-velocity ui, plus a functional of ηijui uj. The second theorem states that all gravitational theories that satisfy the strong equivalence principle have a Lagrangian with a first term gij(x)ui uj plus an irrelevant term. In both cases the theories must issue from a unique variational principle. Therefore, under this condition it is impossible to find a flat space-time theory that satisfies the strong equivalence principle.