Gravitation, Density Upper Limit and Quantization of Space  

Gravitation, Density Upper Limit and Quantization of Space

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作  者:Doron Kwiat Doron Kwiat(Independent Researcher, Mazkeret Batyia, Israel)

机构地区:[1]Independent Researcher, Mazkeret Batyia, Israel

出  处:《Journal of High Energy Physics, Gravitation and Cosmology》2024年第2期534-545,共12页高能物理(英文)

摘  要:The singularity at distance r → 0 at the center of a spherically symmetric non-rotating, uncharged mass of radius R, is considered here. Under inverse square law force, the Schwarzschild metric, needs to be modified, to include Newton’s Shell Theorem (NST). By including NST for r, both Schwarzschild singularity at r = 2GM/c2 and at r → 0 singularities are removed from the metric. Near R → 0, the question of maximal density is considered based on Schwarzschild’s modified metric, and compared to the quantum limit of maximal mass density put by Planck’s quantum-based universal units. It is asserted, that General relativity, when combined with Planck’s universal units, inevitably leads to quantization of gravity.The singularity at distance r → 0 at the center of a spherically symmetric non-rotating, uncharged mass of radius R, is considered here. Under inverse square law force, the Schwarzschild metric, needs to be modified, to include Newton’s Shell Theorem (NST). By including NST for r, both Schwarzschild singularity at r = 2GM/c2 and at r → 0 singularities are removed from the metric. Near R → 0, the question of maximal density is considered based on Schwarzschild’s modified metric, and compared to the quantum limit of maximal mass density put by Planck’s quantum-based universal units. It is asserted, that General relativity, when combined with Planck’s universal units, inevitably leads to quantization of gravity.

关 键 词:GRAVITATION Shell Theorem SINGULARITY Schwarzschild Radius CGH Physics: Planck’s Scale 

分 类 号:O17[理学—数学]

 

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