The higher that the Lorentz-Four-Contraction -- that is to be applied to a given arbitrary orbifold eigenset, happens to become, to where such a said orbifold eigenset is of mass-bearing superstrings of discrete energy permittivity -- the more homotopic residue is then here to tend to diverge from the individually taken superstrings, that work to comprise the said orbifold eigenset. Yet, such an orbifold eigenset will then tend to gain a proportionable higher number of mass-bearing superstrings of discrete energy permittivity, in the process. So, in the process of either a gain or a loss of speed that is to incur upon any given arbitrary orbifold eigenset of mass-bearing superstrings of discrete energy permittivity as a whole -- there tends to be no net loss nor gain of the phenomenology of homotopic residue, in the proximal local region of the said orbifold eigenset itself.
I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
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