Let us say that a set of individually taken superstrings are here to exist in a tense of superconformal invariance, over time. Let us next say that each of the just mentioned superstrings are here to work to comprise one given arbitrary orbifold eigenset, of which is to exist, as well, in a tense of superconformal invariance, over time. Each of the earlier mentioned superstrings are then to work to form a cohomological eigenstate in the process, when this is taken over an evenly gauged Hamiltonian eigenmetric, -- as well as to say that the earlier mentioned orbifold eigenset is then to work to form an overall cohomological eigenstate in the process. If the said superstrings are to be of a mass-bearing nature, these will, over the said evenly gauged metric, tend to generate as much cohomology as these will degenerate. If such a said orbifold eigenset is then to bear the so-eluded-to Yau-Exact conditions (since it is here of a mass-bearing nature that is superconformally invariant), then, such an orbifold eigenset will, as well, tend to generate as much cohomology as it will degenerate, when this is taken over the same evenly gauged metric.
I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
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