Add to ORKGI state and prove, in the context of a space having only the metrical structure imposed by the geometrized version of Newtonian gravitational theory, a theorem analagous to that of Weyl's in a Lorentzian space. The theorem, loosely speaking, says that a projective structure and a suitably defined compatible conformal structure on such a space jointly suffice for fixing the metrical structure of a Newtonian spacetime model up to constant factors. It allows one to give a natural, physically compelling interpretation of the spatiotemporal geometry of a geometrized Newtonian gravity spacetime manifold, in close analogy with the way Weyl's Theorem allows one to do in general relativity
We develop the properties of Weyl geometry, beginning with a review of the conformal properties of R...
Which geometries on a smooth manifold (apart from Lorentzian metrics) can serve as a spacetime struc...
It is discussed how the Weyl geometric generalization of Riemannian geometry relates to Jordan-Brans...
I state and prove, in the context of a space having only the metrical structure imposed by the ge...
I state and prove, in the context of a space having only the\ud metrical structure imposed by the ...
I state and prove, in the context of a space having only the metrical structure imposed by the ge...
I state and prove, in the context of a space having only the\ud metrical structure imposed by the ...
I state and prove, in the context of a space having only the metrical structure imposed by the ge...
I state and prove, in the context of a space having only the metrical and affine structure impose...
I state and prove, in the context of a space having only the metrical and affine structure impose...
I state and prove, in the context of a space having only the metrical structure imposed by the geome...
It is well-known that the conformal structure of a relativistic spacetime is of profound physical an...
General relativity may be formulated as a gauge theory more than one way using the quotient manifold...
We show that the theory of General Relativity can be entirely formulated in the language of the inte...
We show that the theory of General Relativity can be entirely formulated in the language of the inte...
We develop the properties of Weyl geometry, beginning with a review of the conformal properties of R...
Which geometries on a smooth manifold (apart from Lorentzian metrics) can serve as a spacetime struc...
It is discussed how the Weyl geometric generalization of Riemannian geometry relates to Jordan-Brans...
I state and prove, in the context of a space having only the metrical structure imposed by the ge...
I state and prove, in the context of a space having only the\ud metrical structure imposed by the ...
I state and prove, in the context of a space having only the metrical structure imposed by the ge...
I state and prove, in the context of a space having only the\ud metrical structure imposed by the ...
I state and prove, in the context of a space having only the metrical structure imposed by the ge...
I state and prove, in the context of a space having only the metrical and affine structure impose...
I state and prove, in the context of a space having only the metrical and affine structure impose...
I state and prove, in the context of a space having only the metrical structure imposed by the geome...
It is well-known that the conformal structure of a relativistic spacetime is of profound physical an...
General relativity may be formulated as a gauge theory more than one way using the quotient manifold...
We show that the theory of General Relativity can be entirely formulated in the language of the inte...
We show that the theory of General Relativity can be entirely formulated in the language of the inte...
We develop the properties of Weyl geometry, beginning with a review of the conformal properties of R...
Which geometries on a smooth manifold (apart from Lorentzian metrics) can serve as a spacetime struc...
It is discussed how the Weyl geometric generalization of Riemannian geometry relates to Jordan-Brans...