Appendix D
Another Step into Fibonacci Space
The Fibonacci spiral suggests a view of spatial intersections.
The linear spiral intersects with regions of two dimensional space at geometrical points (that have zero dimension.)
A two-dimensional surface intersects with three-dimensional space as a line and three-dimensional space intersects with five-dimensional space as a surface.
Similarly, the only three-dimensionally-experienced intersection is a three-dimensional spatial intersection with 5 and 8 dimensional space in a three-dimensional geometry.
This 3-dimensional geometry is the possible definition of a “black hole.”
From calculations already shown, the barrier energy E-sub-B for 5-dimensions can be quickly arrived at ~ 10^-6 eV/kg.
In three dimensions, points (and small regions around them) exist with this low E-sub-B only where F-sub-B ~ 0 as at the cancellation points of F = ∑G(m1m2)/r^2 = 0 between large masses or at the centers of mass for very large masses.
The points then move on lines as the cancellation location moves. The lines move on surfaces, and so on.
Similarly, a region in deep enough space to have or have had ~ 0 F-sub-G due to large r^2 and even due to cancellation forces, would also have experienced near zero E-sub-B.
