I'm trying to force myself to keep on this schedule. Time is short for so many reasons and the distractions, the requirements of the day are intense. Spatial Mitosis is worth a brief digression, not because the concept is new, it's given before without a name, but parts of it are achieving a certain clarity. This is an excerpt from a chapter on the subject.
There is no randomness to algorithm transitions, but the absence of a homogeneous environment means that the aberrations in the answers to the simple equation must be enormous to allow the appearance of randomness and the richness of the illusion. This is presumably caused primarily by having the spirals offset from one another so the solution for each is slightly out of alignment with the solution for another, but all solved for a single x.
The capacitance and compression portions of the algorithm complete the complexity matrix. It is noted that the outermost “space/ct1” spiral universe is homogeneous until compression. At this stage, since all states are the same, the misalignment has a minimal but it is enough to allow for the initial compression sets that provide for the big bang. An “evolving” algorithm may take considerable time, however, before it introduces the xsin(pi/x2) solution. An evolving algorithm would have very line linear non-spirals until some event caused them to take on the intersecting spiral mechanism. While it’s easy to argue this would be the effect of the anti-spirals (linear f-series “intersecting” spirals) the only “effect” the anti-spirals would have would be a function of the algorithm. There is no physics as we understand it to cause the change.
Whether linear or not,
it is assumed that each spiral set is off in size by one quantum length from
the generating spiral, the spiral giving rise through some quantum mitosis or
cell splitting, the offset being the result of being generated subsequent to
the first, generating spiral which continues its quantum change. However, it is possible that only ct1 can
undergo this process and that all of the universe except that part which is
space had to form in advance of the first compression state. This provides an infinite series of sort,
since as the amount of space decreases relative to other ct1 states, the amount
of mitosis or at least the percentage of mitosis would decrease.
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