Why Does the Hyperbolic Shape of the Black Holes Requier Non-Euclidian Geometry? (The Turbulence in Astronomy)

Authors

  • Maria Kuman

Keywords:

Abstract

When I wrote the article about the hyperbolic shape of the Black Hole [1], it was intuitive envision. (For how intuitive envision is done see [2]). But in this article I will provide a logical proof. 1. If you try to tile regular pentagons, they form a sphere (curvature > 0). 2. If you try to tile regular hexagons, they form a flat surface (curvature = 0). 3. If you try to tile regular heptagons, they form a hyperbolic surface (curvature < 0). Since heptagons form hyperbolic surface and Black Holes with hyperbolic shape give birth to everything material, which is matter and nonlinear electromagnetic field (NEMF) [1] (including the human NEMF), maybe we should not be surprised that the human NEMF has 7 energy levels [3], the human material body has also 7 energy levels [4], and each level has seven sublevels.

How to Cite

Maria Kuman. (2019). Why Does the Hyperbolic Shape of the Black Holes Requier Non-Euclidian Geometry? (The Turbulence in Astronomy). Global Journal of Science Frontier Research, 19(A10), 1–2. Retrieved from https://journalofscience.org/index.php/GJSFR/article/view/2546

Why Does the Hyperbolic Shape of the Black Holes Requier Non-Euclidian Geometry? (The Turbulence in Astronomy)

Published

2019-05-15