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Non-linear extension of non-metricity scalar for MOND

Fabio D’Ambrosio, Mudit Garg, Lavinia Heisenberg

2020Physics Letters B66 citationsDOIOpen Access PDF

Abstract

General Relativity enjoys the freedom of different geometrical interpretations in terms of curvature, torsion or non-metricity. Within this geometrical trinity, a simpler geometrical formulation of General Relativity manifests itself in the latter, where gravity is entirely attributed to non-metricity. In this Letter, we consider non-linear extensions of Coincident General Relativity f(Q˚) for phenomenological applications on both cosmological as well as galactic scales. The theory not only delivers dark energy on large scales but also recovers MOND on galactic scales, together with implications for the early universe cosmology. To the best of our knowledge, this represents the first relativistic, covariant, and ghost-free hybrid-formulation of MOND which recovers both, General Relativity and MOND in the appropriate limits and reconciles expected cosmological behavior. We further illustrate that previous bimetric formulations of MOND generically suffer from ghost instabilities and f(Q˚) crystalizes as a unique ghost-free theory.

Topics & Concepts

PhysicsGeneral relativityCovariant transformationTheoretical physicsCosmologyCurvatureDark energyScalar (mathematics)GravitationTheory of relativityMathematical physicsClassical mechanicsAstrophysicsGeometryMathematicsCosmology and Gravitation TheoriesBlack Holes and Theoretical PhysicsDark Matter and Cosmic Phenomena
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