Adjacent Assymetric Orbifold Eigensets

Let us initially consider two different orbifold eigensets, that are immediately adjacent.  Let us next say that both of the individually taken orbifold eigensets, are to here to be undergoing a tense of Majorana-Weyl-Invariance at the "time."  Let us next say, that one were to extrapolate -- in so as then to compare   - the tense of the antiholomorphic Kahler conditions of the superstrings that are here to comprise one of the here given arbitrary orbifold eigensets, to the antiholomorphic Kahler conditions of the superstrings that are here to comprise the other given arbitrary orbifold eigenset, that is of this respective case.  In the process of such an extrapolation, one would here to be comparing those complex roots that are to here to be directly associated with both the Lagrangian-based Chern-Simons singularities and/or the metrical-based Chern-Simons singularities, that are to be formed via the interaction of the composite discrete quanta of energy of the two individually taken orbifold eigensets, as these are here to be undergoing a Fourier Transform, over a discrete amount of time.  Let us next say that the vibrational oscillation of the two here comparitive orbifold eigensets, is to be of an assymetric-based nature.  This will often mean, that the comparitive complex roots of their Lagrangian-based Chern-Simons singularities may then tend to be Njenhuis to one another -- during the said Majorana-Weyl-Invariant-Mode.  Sincerely, Samuel David Roach.