On the geodesic hypothesis in general relativity

Abstract

In this paper, we give a rigorous derivation of Einstein's geodesic hypothesis in general relativity. We use scaling stable solitons for nonlinear wave equations to approximate the test particle. Given a vacuum spacetime ([0, T]×R3, h), we consider the scalar field coupled Einstein equations. For all sufficiently small ε and δ≤ εq, q>1, where δ, ε are the amplitude and size of the particle, we show the existence of solution ([0, T]×R3, g, φε) to the coupled Einstein equations with the property that the energy of the particle φε is concentrated along a timelike geodesic. Moreover, the gravitational field produced by φε is negligibly small in C1, that is, the spacetime metric g is C1 close to h. These results generalize those obtained by D. Stuart.