Add to ORKGHere we consider a variant of the 5 dimensional Kaluza-Klein theory within the framework of Einstein-Cartan formalism that includes torsion. By imposing a set of constraints on torsion and Ricci rotation coefficients, we show that the torsion components are completely expressed in terms of the metric. Moreover, the Ricci tensor in 5D corresponds exactly to what one would obtain from torsion-free general relativity on a 4D hypersurface. The contributions of the scalar and vector elds of the standard K-K theory to the Ricci tensor and the affine connections are completely nulli ed by the contributions from torsion. As a consequence, geodesic motions do not distinguish the torsion free 4D space-time from a hypersurface of 5D space-time with to...
We study the entanglement production for Dirac and Klein-Gordon fields in an expanding spacetime cha...
We compare the gauging of the Bargmann algebra, for the case of arbitrary torsion, with the result t...
It is known that General Relativity ({\bf GR}) uses Lorentzian Manifold $(M_4;g)$ as a geometrical m...
A modification of Kaluza-Klein theory is proposed in which, as a result of a symmetry breaking, five...
Torsion appears in literature in quite different forms. Generally, spin is considered to be the sour...
We consider a theory of gravity with a hidden extra dimension and metric-dependent torsion. A set of...
We consider a theory of gravity with a hidden extra dimension and metric-dependent torsion. A set of...
The Einstein-Cartan equations in first-order action of torsion are considered. From Belinfante-Rosen...
f(R)-gravity with geometric torsion (not related to any spin fluid) is considered in a cosmological ...
We attempt an answer to the question as to why the evolution of a four-dimensional universe is gover...
We generalize the Tolman-Oppenheimer-Volkoff equations for space-times endowed with a Weyssenhoff li...
We introduce a generalized tetrad which plays the role of a potential for torsion and makes torsion ...
We analyze the kinematics of cosmological spacetimes with nonzero torsion, in the framework of the c...
We review the application of torsion in field theory. First we show how the notion of torsion emerge...
We compare the gauging of the Bargmann algebra, for the case of arbitrary torsion, with the result t...
We study the entanglement production for Dirac and Klein-Gordon fields in an expanding spacetime cha...
We compare the gauging of the Bargmann algebra, for the case of arbitrary torsion, with the result t...
It is known that General Relativity ({\bf GR}) uses Lorentzian Manifold $(M_4;g)$ as a geometrical m...
A modification of Kaluza-Klein theory is proposed in which, as a result of a symmetry breaking, five...
Torsion appears in literature in quite different forms. Generally, spin is considered to be the sour...
We consider a theory of gravity with a hidden extra dimension and metric-dependent torsion. A set of...
We consider a theory of gravity with a hidden extra dimension and metric-dependent torsion. A set of...
The Einstein-Cartan equations in first-order action of torsion are considered. From Belinfante-Rosen...
f(R)-gravity with geometric torsion (not related to any spin fluid) is considered in a cosmological ...
We attempt an answer to the question as to why the evolution of a four-dimensional universe is gover...
We generalize the Tolman-Oppenheimer-Volkoff equations for space-times endowed with a Weyssenhoff li...
We introduce a generalized tetrad which plays the role of a potential for torsion and makes torsion ...
We analyze the kinematics of cosmological spacetimes with nonzero torsion, in the framework of the c...
We review the application of torsion in field theory. First we show how the notion of torsion emerge...
We compare the gauging of the Bargmann algebra, for the case of arbitrary torsion, with the result t...
We study the entanglement production for Dirac and Klein-Gordon fields in an expanding spacetime cha...
We compare the gauging of the Bargmann algebra, for the case of arbitrary torsion, with the result t...
It is known that General Relativity ({\bf GR}) uses Lorentzian Manifold $(M_4;g)$ as a geometrical m...