Decreased Number Of Spin-Orbital-Related Tensors

Whenever two different stages of the motion of a given arbitrary charged mass-bearing orbifold eigenset, are to bear a similar manner of a spatial translation -- over time -- except, that the second of these two said stages or phases of motion,  that is here to be of the said charged mass-bearing orbifold eigenset of this particular case, to where this is to be happening over an ensuing relatively transient duration of time, to where it is to bear a lower number of spin-orbital-related tensors, over the comparative inferred Lagrangian, that is here to be subsequent to the initially inferred Lagrangian-related spatial translation, that are both to be mappable over their pertinent respective stages of motion, to where the inferred second occurring Fourier-related Lagrangian-based stage or phase of motion, that is here to be corresponding to that inferred self-same eigenset, -- will then consequently tend to bear the condition, of a resultant lowered perturbation in its directly associated Chern-Simons Invariants, that are here to be of the inferred second occurring stage of motion of the said eigenset of this particular case, to where such a said tense of a perturbation, will consequently decrease in its scalar amplitude. Consequently; the stated (inferred) second occurring stage of motion, that is here to be directly appertaining to the relatively latter motion of the herein stated orbifold eigenset, -- will consequently tend to bear the results of a lowered scalar magnitude of charge, than it had previously exhibited during the course of the initial stage or phase of motion of this given arbitrary case scenario, over time. I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.