English

Extensions of GR using Projective-Invariance

General Relativity and Quantum Cosmology 2020-06-08 v2

Abstract

We show that the unification of electromagnetism and gravity into a single geometrical entity can be beautifully accomplished in a theory with non-symmetric affine connection (ΓμνλΓνμλ{\Gamma}_{\mu\nu}^{\lambda}\neq{\Gamma}_{\nu\mu}^{\lambda}), and the unifying symmetry being projective symmetry. In addition, we show that in a purely-affine theory where there are no constrains on the symmetry of Γμνλ{\Gamma}_{\mu\nu}^{\lambda}, the electromagnetic field can be interpreted as the field that preserves projective-invariance. The matter Lagrangian breaks the projective-invariance, generating classical relativistic gravity and quantum electromagnetism. We notice that, if we associate the electromagnetic field tensor with the second Ricci tensor and Γ[μν]ν{\Gamma}_{[\mu\nu]}^{\nu} with the vector potential, then the classical Einstein-Maxwell equation can be obtained. In addition, we explain the geometrical interpretation of projective transformations. Finally, we discuss the importance of the role of projective-invariance in f(R) gravity theories.

Keywords

Cite

@article{arxiv.1405.5503,
  title  = {Extensions of GR using Projective-Invariance},
  author = {Ahmed Alhamzawi and Rahim Alhamzawi},
  journal= {arXiv preprint arXiv:1405.5503},
  year   = {2020}
}

Comments

Dear arxiv, We would like to withdraw this article because we have discovered some incomplete assumptions at the begining of the paper which may result in some instability in the rest of the theory presented in the paper. Currenctly, We have not reached a viable way to correct these assumptions so we think it is best to withdraw the paper. Best Regards, Authors

R2 v1 2026-06-22T04:20:10.651Z