Let us consider a case, where one is to have two different orbifold eigensets -- of which are here to be both working to bear their own respective cohomological mappable-tracing, as these two said respective eigensets are here to be working to form what is here to be two different Rham-based cohomological-related Lagrangian-based paths, over time. Let us next consider, that, over the course of an ensuing sequential series of iterations of group-related instanton -- these two so-stated orbifold eigensets are to collide at a multidimensional angle, that is not of a Ward-Supplemental manner. The resultant cohomological-related path or paths -- that is then to be formed by the initial two said orbifold eigensets -- will then tend to work to form both at least one set of Lagrangian-based Chern-Simons singularities, as well as also tending to form at least one set of metrical-based Chern-Simons singularities (because both of the initially stated orbifold eigensets are not necessarily going to coalesce, as well as the general condition that an orbifold eigenset is comprised of one or more discrete quanta of energy, as such energy is here to be kinematic over time). This will then tend to work to form a resultant tense of Doubolt cohomology. Again, an orbifold eigenset is a set of one or more discrete quanta of energy, that operate in so as to work to perform one specific function.
I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
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