Let us again, consider an approximate "U-shaped" cohomology -- that is formed, by an orbifold eigenset -- that is to initially evenly accelerate between two Laplacian-based parallel axions. This said cohomology, is to approximately be of a Minkowski-based planar curve. This so-stated cohomology, is to initially bear no Chern-Simons singularities. At the initial instanton at which the said orbifold eigenset is to be at the here relative norm-to-forward-holomorphic position, -- to where the said even acceleration of the said orbifold is to take its velocity to momentarily be zero, the respective orbifold eigenset is to then, all of the sudden, accelerate between two relatively Njenhuis axions -- that are thence normal to the initially stated axions. This said eigenset, will then work to form a "U-shaped" cohomological pattern, that is both Njenhuis and orphoganal to the initially stated "U-shaped" cohomology. When this happens, such an activity will then work to form the conditions of both metrical and Lagrangian-based Chern-Simons singularities. Due to the sudden change in the respective accceleration, since the here given arbitrary even flow of acceleration is to here be re-directed, -- there will here tend to be a metrical-based Chern-Simons set of singularities. Since the so-eluded-to change in the Reimmanian Ward-Caucy-based conditions of the orphoganation of the respective correlative slope, in which the respective "U-shaped" cohomology -- is to bear its correlative Fourier Transformation, -- this will then tend to work to cause the said mappable-tracing of the so-stated orbifold eigenset, to bear at least one set of singularities, at the so-eluded-to respective correlative critical cusp. Since the said critical cusp is to here, act in so as to work to bear a relative jointal-based critical cusp -- at the moment of going from initially iterating in one general genus of a Reimmanian plane, into then iterating at a relatively orphoganal tense of a Reimmanian plane, this general respective activity, will then tend to work to form a set of one or more Lagrangian-based Chern-Simons singularities.
I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
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