Nonlinear Mathematical Model in Torus Representation Explains the Elliptical Planetary Orbits and the Cycle of Precession of Our Sun

Nonlinear Mathematical Model in Torus Representation Explains the Elliptical Planetary Orbits and the Cycle of Precession of Our Sun

Prof. Maria Kuman

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Nonlinear Mathematical Model in Torus Representation Explains the Elliptical Planetary Orbits and the Cycle of Precession of Our Sun

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Abstract

The whole material world is a material body and a torus (NEMF). This explains why the torus in the nonequilibrium theory is the tridimensional attractor to which the NEMF of the whole material world (alive and not alive) adhere. Torus (as well as all stars), our Earth, man, plants, etc. For this reason, nonlinear mathematical model was used in torus representation, in which the equations have simplest form, a presentation. This geometrical presentation shows clearly that only external perturbation can elongate the circular orbits of the planets into ellipses. Since in the search of other inhabited planets it was found that all planetary orbits in our galaxy were ellipses, the disturber must be of galactic origin. Astronomical observations found that an intruder galaxy, which our galaxy swallowed long time ago, still orbits (the Black Hole weighing millions of solar masses and the leftove This disturbs all the stars and planets in the galaxy. 2/ This makes the axis of spinning of all the stars in the galaxy, including our Sun, to wobble (called cycle of precession) in synchrony with the orbiting intruder galaxy around the center of our galaxy.

References

11 Cites in Article

Reference Format

Isaac Newton (1687). Philosophiae naturalis principia mathematica.
J Schneider Interactive Extrasolar Planets Catalog.
G Ioss,D Joseph (1980). Elementary Stability and Bifurcation Theory.
J Bailin (2003). Evidence for Coupling between the Sagittarius Dwarf Galaxy and the Milky Way Warp.
E Burgess (1989). Surya Siddhanta.
M Kuman (null). Open Access Journal of Mathematical and Theoretical Physics.
M Kuman Why Solar Cycles? Modeling the Solar Dynamic.
S Popov,M Prokhorov (2006). Progenitors with Enhanced Rotation and the Origin of Magnetars.
A Steiner,S Gandolfi,F Fattoyev,W Newton (2015). Using neutron star observations to determine crust thicknesses, moments of inertia, and tidal deformabilities.
M Kuman (2019). Open Access Journal of Mathematical and Theoretical Physics.
M Kuman (2019). New Light on the Attractors Creating Order out of the Chaos.

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No external funding was declared for this work.

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The authors declare no conflict of interest.

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How to Cite This Article

Prof. Maria Kuman. 2019. \u201cNonlinear Mathematical Model in Torus Representation Explains the Elliptical Planetary Orbits and the Cycle of Precession of Our Sun\u201d. Global Journal of Science Frontier Research - A: Physics & Space Science GJSFR-A Volume 19 (GJSFR Volume 19 Issue A10).

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GJSFR Volume 19 Issue A10

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Crossref Journal DOI 10.17406/GJSFR

Print ISSN 0975-5896

e-ISSN 2249-4626

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GJSFR-A Classification FOR Code: 020199

Submission ReceivedSeptember 22, 2019
Peer Review Double Blind
Handling Editor
Accepted October 21, 2019
Published November 5, 2019

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November 1, 2019

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