English

Conformal Fourth-Rank Gravity

General Relativity and Quantum Cosmology 2007-05-23 v1

Abstract

We consider the consequences of describing the metric properties of space- time through a quartic line element ds4=Gμνλρdxμdxνdxλdxρds^4=G_{\mu\nu\lambda\rho}dx^\mu dx^\nu dx^\lambda dx^\rho. The associated "metric" is a fourth-rank tensor GμνλρG_{\mu\nu\lambda\rho}. We construct a theory for the gravitational field based on the fourth-rank metric GμνλρG_{\mu\nu\lambda\rho} which is conformally invariant in four dimensions. In the absence of matter the fourth-rank metric becomes of the form Gμνλρ=g(μνgλρ)G_{\mu\nu\lambda\rho}=g_{(\mu\nu}g_{\lambda\rho )} therefore we recover a Riemannian behaviour of the geometry; furthermore, the theory coincides with General Relativity. In the presence of matter we can keep Riemannianicity, but now gravitation couples in a different way to matter as compared to General Relativity. We develop a simple cosmological model based on a FRW metric with matter described by a perfect fluid. Our field equations predict that the entropy is an increasing function of time. For kobs=0k_{obs}=0 the field equations predict Ω4y\Omega\approx 4y, where y=pρy={p\over\rho}; for Ωsmall=0.01\Omega_{small}=0.01 we obtain ypred=2.5×103y_{pred}=2.5\times 10^{-3}. yy can be estimated from the mean random velocity of typical galaxies to be yrandom=1×105y_{random}=1\times10^{-5}. For the early universe there is no violation of causality for t>tclass1019tPlanck1024st>t_{class}\approx10^{19}t_{Planck}\approx 10^{-24}s.

Keywords

Cite

@article{arxiv.gr-qc/9303009,
  title  = {Conformal Fourth-Rank Gravity},
  author = {Victor Tapia and A. L. Marrakchi and M. Cataldo},
  journal= {arXiv preprint arXiv:gr-qc/9303009},
  year   = {2007}
}

Comments

39 pages, plain TEX