The higher that the Polyakov Action is to be, for any one superstring of discrete energy permittivity -- the more partition-based discrepancies that such a said respective superstring will then tend to have. The higher that the relative scalar amplitude is -- of the tense of the Majorana-Weyl-Invariant-Mode, for any discrete quantum or for any discrete quanta of energy -- the more partition-based discrepancies that the respective superstrings that work to comprise the respective phenomenon, that is of such a said tense a Majorana-Weyl-Invariant-Mode, will then tend to have. Homotopic residue is of the exchange of what I have here described of as being partition-based discrepancies, which is here to be at the substringular level. This will then tend to mean, that partition-based discrepancies tend to be exchanged to a higher scalar magnitude -- towards superstrings that are of a higher scalar amplitude of the Polyakov Action. This will then tend to mean, that homotopic residue tends to flow towards those superstrings, that work to comprise those respective orbifold eigensets, that are here to work to bear a relatively high tense of conformal invariance. Homotopic residue tends to "move" in the direction of the most conformal invariance. The lower that the velocity is -- of an orbifold eigenset that is taken at an internal reference-frame -- the more that homotopic residue will then tend to flow into those superstrings of discrete energy permittivity, that work to comprise such a said composite orbifold eigenset.
I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
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