Let us initially consider one given arbitrary orbifold eigenset, that is moving through a Lagrangian-based path -- that is either generating or degenerating cohomology, -- over a correlative gauged-metric. In so long as the Lagrangian-based path, that the said orbifold eigenset is to be moving through, is of a discrete nature, -- the said eigenset is to bear metrical-based Chern-Simons singularities, yet it is not to bear any Lagrangian-based Chern-Simons singularities, -- to where the directly corresponding Lagrangian-based path, is to tend to be of a purely hermitan nature, over the said gauged-metric. Think of the following reverse-fractal case. Do you remember the condition that, when we interact with atoms, how we tend to basically just interact with the electrons of these atoms, in our general daily experience? Electrons may be perceived of as being the "shell" of an atom. Next, going back to what I was saying before -- let us say that the so-stated orbifold eigenset that is of this main case scenario, were to go through a cycle of morphological permutations, over time. Such changes in the morphology of the eigenindices of the said orbifold eigenset, are to tend to be of a change in the "shell-like" morphological eigenindices, that are of the topological stratum of the said respective orbifold eigenset. Such a cyclical pattern of the morphological permutation of a Ward-Caucy-based phenomenon, such as of an orbifold eigenset, may be said to be of the genus or of the nature of being called a Calabi-based cyclic permutation. I will continue with the suspense later! To Be Continued!
Sincerely, Samuel David Roach.
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