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An Alternative Model of the General Relativity Theory
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V. G. Boltyanski
Published/Copyright:
June 3, 2010
Abstract
We establish in the offered paper that a ‘displacement postulate’ for the light sphere allows to obtain a metric in four–dimensional space–time from which the well–known Schwarzschild's metric may be simply deduced (by passing to the locational time). Probably, displacement postulate is a description of a profound mechanism of an interaction between the particles and the gravitational field.
Key words and phrases.: Mathematical model of gravitation; Schwarzschild's metric; general relativity theory; superlight particles; tackions; aura; telepathy; telekinesis
Published Online: 2010-06-03
Published in Print: 1995-December
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Articles in the same Issue
- An Alternative Model of the General Relativity Theory
- Nonlinear Contractions on Semimetric Spaces
- On Weakly Darboux Functions and Some Problem Connected with the Morrey Monotonicity
- On Translations of Sets and Functions
- Global Existence of Solutions for Dirichlet Problem to Nonlinear Diagonal Parabolic System with Maximal Growth Conditions
- On Affine Selections of Set–Valued Functions
- Coinitial Families of Perfect Sets
- Fixed Point and Approximate Fixed Point Theorems for Non–Affine Maps
- Domains of Attraction with Inner Norming on Sturm–Liouville Hypergroups
Keywords for this article
Mathematical model of gravitation;
Schwarzschild's metric;
general relativity theory;
superlight particles;
tackions;
aura;
telepathy;
telekinesis
Articles in the same Issue
- An Alternative Model of the General Relativity Theory
- Nonlinear Contractions on Semimetric Spaces
- On Weakly Darboux Functions and Some Problem Connected with the Morrey Monotonicity
- On Translations of Sets and Functions
- Global Existence of Solutions for Dirichlet Problem to Nonlinear Diagonal Parabolic System with Maximal Growth Conditions
- On Affine Selections of Set–Valued Functions
- Coinitial Families of Perfect Sets
- Fixed Point and Approximate Fixed Point Theorems for Non–Affine Maps
- Domains of Attraction with Inner Norming on Sturm–Liouville Hypergroups
