REVOLUTIONARY DYNAMIC THEORY OF GRAVITATION

Authors

  • O. Nwagbara Department of Physics,Faculty of Science,Kingsley Ozumba Mbadiwe University,Ideato Orlu,Nigeria Author
  • A.O. Obioha Department of Physics,Faculty of Science,Kingsley Ozumba Mbadiwe University,Ideato Orlu,Nigeria Author
  • S.C.I. Igbokwe Department of Physics,Faculty of Science,Kingsley Ozumba Mbadiwe University,Ideato Orlu,Nigeria Author
  • P. O. Ogwo Department of Physics,Faculty of Science,Kingsley Ozumba Mbadiwe University,Ideato Orlu,Nigeria Author
  • M. U. Nduka Department of Physics,Faculty of Science,Kingsley Ozumba Mbadiwe University,Ideato Orlu,Nigeria Author

DOI:

https://doi.org/10.60787/jnamp-v66-322

Keywords:

Golden Laplacian Operator, Field Equation, Dynamic Spherical Massive Bodies, Generalized Gravitational Scalar Potentials

Abstract

Gravitation is one of the fundamental forces of Physics and the current understanding of gravity is based on Einstein’s General Relativity theory which is formulated within the entirely different framework of Classical Physics. In this research, a generalized Newton’s gravitational field equation for a dynamic homogeneous spherical massive body that depends on the radial distance and 
time only was obtained using the Golden Riemannian Laplacian Operator. The generalized gravitational field equation was also applied to a dynamic homogeneous spherical massive body in order to obtain a generalized Newton’s gravitational scalar potential exterior and interior to the body. The results are that the Revolutionary dynamical gravitational field equation and gravitational 
scalar potential exterior and interior to the body contains terms of order ????−2 which are neither found in the existing Newton’s and Einstein’s gravitational field equations and gravitational scalar potentials

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References

Anderson, J.L. (1967), Principles of Relativity Physics (Academic Press: New York), Pp 419.

Arfken, G. (1995), Mathematical Methods for Physicists, 5th edition, (Academic Press: New York), Pp 467-469.

Bergman, P.G. (1987), Introduction to the theory of Relativity (Prentice Hall: India), Pp 203.

Halpern L and Laurent B (1964), On the Gravitational Radiation of Microscopic Systems (II NouvoCimento), Pp 728-751.

Howusu, S.X.K. (2013), Riemannian Revolution in Physics and Mathematics (Jos University Press: Nigeria), Pp 23.

Szekeres G.(1960), On the Singularities of a Riemannian Manifold (Math. Debreca), Pp 285.

Wald R.M. (1984), General Relativity (The University Press: Chicago).

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Published

2024-05-27

How to Cite

REVOLUTIONARY DYNAMIC THEORY OF GRAVITATION. (2024). The Journals of the Nigerian Association of Mathematical Physics, 66, 47-60. https://doi.org/10.60787/jnamp-v66-322

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