Conservation, Inertia, and Spacetime Geometry
Abstract
As Harvey Brown emphasizes in his book Physical Relativity, inertial motion in general relativity is best understood as a theorem, and not a postulate. Here I discuss the status of the "conservation condition", which states that the energy-momentum tensor associated with non-interacting matter is covariantly divergence-free, in connection with such theorems. I argue that the conservation condition is best understood as a consequence of the differential equations governing the evolution of matter in general relativity and many other theories. I conclude by discussing what it means to posit a certain spacetime geometry and the relationship between that geometry and the dynamical properties of matter.
Cite
@article{arxiv.1702.01642,
title = {Conservation, Inertia, and Spacetime Geometry},
author = {James Owen Weatherall},
journal= {arXiv preprint arXiv:1702.01642},
year = {2017}
}
Comments
48 pages; Forthcoming in Studies in History and Philosophy of Modern Physics