A Non-Metric Approach to Space, Time and Gravitation

Abstract

In this thesis, a non-standard geometric framework, the "quasi-metric" framework (QMF), is used to define relativistic space-time. The QMF consists of a 4-dimensional space-time manifold equipped with two one-parameter families of Lorentzian 4-metrics gt and gt parametrized by a (unique) global time function t. The global time function represents one extra degenerate time dimension and it defines a "distinguished" foliation of quasi-metric space-time into spatial hypersurfaces. The metric family gt is found as solutions of field equations, whereas the metric family gt is found via a local transformation gt→ gt and is used in the equations of motion. The role of the degenerate dimension is to describe global scale changes between gravitational and non-gravitational systems. In particular, this yields an alternative description of the expansion of the Universe. In this thesis, a quasi-metric theory of gravity is constructed. Like General Relativity, the field equations have two independent propagating dynamical degrees of freedom. However, a number of non-standard features makes the field equations unsuitable for a standard PPN-analysis. This implies that the experimental status of the theory is not completely clear at this point in time. But the non-metric part of the theory may be tested rather independently. That is, the theory predicts that gravitational fields in vacuum and gravitationally bound bodies made of ideal gas expand like the expansion of the Universe. Several observations suggest this; e.g., the "Pioneer effect", the mean acceleration of the Moon, the spin-down of the Earth, palaeo-tidal records, etc. Thus quasi-metric relativity has experimental support where metric theories fail.

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…