Let us consider an orbifold eigenset, -- that is to initially be in an anharmonic perturbative Ward-Caucy-based condition of kinematic reverberation -- as it is going through a correlative entropic Fourier-related transformation. Let us next say, that a group-attractor is to then to be introduced into the proximal local region, in which the said orbifold eigenset is to be of the general condition of being in an initially anharmonic scattered condition. Next, let's say that the correlative group-attractor that had just become Yukawa to the Ward-Caucy region, in which the so-stated orbifold eigenset was to here be differentiating in a chaotic manner -- is to help at working to cause a general genus of wave-tug, that is to then to work to cause a harmonic scattering of the eigenindices of the eigenstates of the said orbifold eigenset -- to where there is to then be the Wess-Zumino condition of a Reimman scattering of the core-field-density of the Gliosis-based topological sway of such eigenstates, that are here to be at the Poincare level. Let's then say, that over an ensuing relatively transient sequential series of instantons, that the so-stated orbifold eigenset is to then to be tugged-out of its so-eluded-to relatively tightly-knit tense of a Majorana-Weyl-Invariant-Mode, -- to where it is to then be propagated with an even acceleration, across a smoothly harmonic oscillatory-based path. Let's next consider, that the said orbifold eigenset is of a mass-bearing integration of Yau-Exact eigenstates, that are to here to work together, in so as to form a discrete Hodge-Index of Reimman-based gravitational eigenindices, that are here to be propagated in a hermitian manner, over the ensuing duration of a sequential series of group-related instantons. Such an orbifold eigenset will tend to not bear -- neither any metrical-based Chern-Simons singularities, nor any Lagrangian-based Chern-Simons singularities. In so long as there is no eminent collision here, that would otherwise act in so as to work to help at forming the Cevita condition of what would here be a resultant Rayleigh scattering of such a Yau-Exact tense of a mass-bearing radiation, the harmonic flow of the composite eigenindices -- that had worked to comprise the said orbifold eigenset, will not spontaneously tend to bear any complex Kahler-based roots.
I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
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