Page 319 - The Final Appeal to Mankind
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«The Final Appeal to Mankind» by Nicolai Levashov
where:
(-)
χ – equals the central zone of matrix space mergence through which primary matters
flow out of our matrix space. (A superanalog is the black hole.)
(+)
η – equals the border zones of matrix space mergence through which primary matters
flow into our matrix space.
mi – equals the mass of primary matters of the above.
Equation (16) may be rewritten in the following clearer and more convenient form:
(+)
(-)
∫∫χ dmidi - 6∫∫η dmidi ≡ 0 (18)
Naturally, such superspaces abound in our matrix space. They generate what we might
call ТnodesУ in the matrix space and, metaphorically speaking, are its ТatomsУ. Thus,
again, we see the structural analogy between macrocosm and microcosm – imparting
to us still another corroboration of their fundamental unity.
Chapter 12. Matrix space systems
A matrix space happens to be non-uniform in dimensionality: this leads to its mergence
in specific zones with other matrix spaces, thereby giving rise to the formation of
superspaces.
The stability of matrix spaces is maintained by a balance between the amount of matter
synthesized in the positive zones of mergence and the amount of matter outflowing
from the negative zones.
These processes lead to the creation of a certain number of six-ray (n1) and anti six-ray
(n2) space types. Stability of the matrix space is possible if the following equation is
satisfied:
(+)
n1∫∫χ dmidi - 6∫∫η dmidi ≡ n2∫∫χ dmidi - 6∫∫η dmidi (19)
(-)
(+)
(-)
The probability of the formation of both six-ray and anti six-ray spaces is equally likely
along the scale of the entire matrix space. The quantity of these respective space types
is approximately equal: (n 1 = n 2)
(-)
(+)
∫∫(χ – χ ) dmidi ≡ 0
(-)
(+)
∫∫(η - η ) dmidi ≡ 0 ( 20 )
We may reconcile the conditions of the equation only if:
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