Motion of test particles in spacetimes with torsion and nonmetricity
Damianos Iosifidis, Friedrich W. Hehl
Abstract
We derive the equations of motion of a test particle with intrinsic hypermomentum in spacetimes with both torsion S and nonmetricity Q (along with curvature R ). Accordingly, S and Q can be measured by tracing out the trajectory followed by a hypermomentum-charged test particle in such a non-Riemannian background. The test particle is approximated by means of a Dirac δ -function. Thus we find a tangible way to observe and measure the effects of torsion and nonmetricity. Our results are consistent with earlier ones derived by Obukhov and Puetzfeld (2014) by means of a different method. We apply our insight and evaluate how far-reaching the so-called ‘geometrical trinity of gravity’ really is.
Topics & Concepts
PhysicsClassical mechanicsTorsion (gastropod)Motion (physics)Equations of motionMedicineAnatomyCosmology and Gravitation TheoriesRelativity and Gravitational TheoryBlack Holes and Theoretical Physics