Journal ArticleDOI
Extended class of metric tensors in relativity
TLDR
In this article, it was shown that the spin-1 massless field vanishes in the linear approximation for the extended metric tensor, which is a function of an internal vectorya(x).Abstract:
An extended “metric” tensor that is a function of an internal vectorya(x) leads to a spin-1 massless field of gravitational origin. It is shown that this new field vanishes in the linear approximation for the extended “metric.”read more
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Posted Content
Minimal length discretization and properties of modified metric tensor and geodesics
TL;DR: In this article, the authors argue that the minimal length discretization generalizing the Heisenberg uncertainty principle, in which the gravitational impacts on the noncommutation relations are thoughtfully taken into account, radically modifies the spacetime geometry.
Proceedings ArticleDOI
Minimal length discretization and properties of modified metric tensor and geodesics
TL;DR: In this article , the authors argue that the minimal length discretization generalizing the Heisenberg uncertainty principle, in which the gravitational impacts on the noncommutation relations are thoughtfully taken into account, radically modifies the spacetime geometry.
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Journal ArticleDOI
Some constructive comments on the theory of fields in Finsler spaces
TL;DR: In this paper, the authors describe a role of a vec to play in the role of an arb i t r a r y vec tor, which is a role similar to the one played in this paper.
Journal ArticleDOI
Some constructive remarks on the theory of fields in Finsler spaces
TL;DR: In this article, the authors discuss the role of the vec to play in the role as a role of an arboriology role in the context of a large number of VIFs.
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