More As To A Certain Tense Of A Perturbation Series

The general course of the activity of a superstringular perturbation series -- in which a set of inferred orbifold eigensets are to change in both their tense of interdependent inter-connection, and in their tense of interdependent intrinsic directional tedency -- will often re-localize in a Ward-Supplemental manner, in a Nijenhuis tense, toward the direction of the change in angular homotopy.  This is caused, in part, by the correlative coniaxial-related twists, that are to consequently happen to the directly corresponding superstrings of discrete energy permittivity, in the process of such an inferred tense of a perturbation series.  The buffer that is here to work to allow for the relatively smooth translation of such an alteration in the consequently altering interdependent inter-relationhip, that is of such an inferred set of orbifold eignesets, will tend to be produced by the harmonic sway of those wave connections, which were re-localized by the propagation of the directly correlative axions, that are here to be most associated with the shift in the Fourier-related re-positioning of the here mentioned orbifold eigensets -- that are here to have just changed in their tense of operation, over the course of what is here to have occurred over a relatively brief duration of time.  Such axions are here to have been generated by those tensors, that had here worked to cause a euclidean re-positioning, every time that the related superstrings were here to have spontaneously torqued in their directly corresponding holonomic composition.  This general Hamiltonian-based angular momentum tense of an alteration, would consequently, by interacting with the mentioned "buffer," tend to work to diverge the local invariance of the set of interactive traits, yet, it would tend to work to converge the directly associated activity of the said given arbitrary respective set of orbifold eigensets,  into a  kinematic differentiation in the perturbation of their covariant activity.  To Be Continued!  Sincerely, Samuel David Roach.