More About the Activity of the Kaeler Metric
The Kaeler Metric is active over the course of 191 iterations of Ultimon Flow per iteration of its general metric that is effectual towards the Gaussian Transform of specific given arbitrary superstrings that exist in the substringular. The sub-Fourier-based gauge-metric iterations of the Kaeler Metric, when it is active, are right after a superstring or a set of superstrings falls into the Klein Bottle, which is right after the BRST portion of individual iterations of group instanton. When the Kaeler Metric is active, it also happens right before the Regge Action eigenstate portions of the same set of iterations of group instanton. The Kaeler Metric happens in a minimum of two cycles, with 191 iterations of Ultimon Flow before it is interactive with the shaking of superstrings in the Klein Bottle & 191 iterations of Ultimon Flow after it is interactive with the shaking of superstrings in the Klein Bottle. The specifics as to what I mean by this will be thoroughly discussed during course 24 about superconformal invariance and conformal invariance. This means that a general group-metric that involves Kaeler Metric eigenmetrics provides a process of recreating enough permittivity in superstrings for a minimum of two sets of superstrings in one general locus that are to obtain enough permittivity in order to remain as the enery that these are so that discrete energy may exist -- (at least one superstring per set). Such Kaeler-Metric eigenmetrics also work -- at the same general metrical duration -- to give discrete permittivity back to Fadeev-Popov-Traces so that discrete energy may continue to exist -- so that energy will ot shatter. So, the overall activity of a Higgs Action eigenstate is interactive upon a specific substringular local region for a minimum of 764 iterations of Ultimon Flow. This is because the kinematic interaction of a Higgs Action eigenstate upon a specific local region in the substringular has its 382nd iteration (which is in-between instantons) at one Planck Length from where it started, while yet needing another group eigenmetric of iterations (again, in-between instantons) to go back to the same locus from where it started. Yet, Gaussian Transformations are always happening somewhere in the substringular at many substringular neighborhoods that are adjacent. So, Higgs Action eigenstates are constantly busy. The more perturbative the substringular region, the more busy the local Higgs Action eigenstates are.in that region. The Hausendorf Projections that happen right before the Wick Action help Higgs Action eigenstates to commute to the proper settings where these may be used as the "force" that transports the Klein Bottle eigenstates to allow the Kaeler Metric to allow superstrings to reattain their permittivity. Again, more will be mentioned about this later. I will continue with the suspense! Sincerely, Samuel David Roach.
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