The Ninth Session Of Course Ten

What general type of a perturbation series would propagate if certain strings of covariant traits were to aquire topological sways, and how would this alter the angular momentum of that homotopic condition whose phenomenology is defined by the interaction of those covariant traits which act in an eigen manner toward the pertainent differentiable semi-groups?  (The semi-groups here are norm- states that act as catylists to the formation of those strings which encode for the mentioned covariant traits)?  As an arbitrary example:  A superstring is reiterated within the same neighborhood, or, in other words, within the same general substringular region.  Zillions of related strings do the same here too.  A minority of the two-dimensional strings related here iterate and reiterate in a relatively side-to-side manner on a slightly differentiable coaxial basis.  These strings maintain an even function of polar shift when one is to consider the Ward amplitude of all of the resultant Real Reimmanian and Njenhuis tensors that inter-relate in a manner that forms a unitized group tree-amplitude diretoral.  This just mentioned activity operates to allow the corresponding superstrings to not get "kicked out" of their association with the other superstrings that also help to define the basis of their respective covariant traits.  The change in the resultant holomorphic index, thus caused, commutes phase change in the nodation of the anharmonic oscillation pattern that may be mapped through a Lagrangian over an affiliated Fourier Transformation.  This causes a change in wave connection and wave-tug between the other superstrings and the other mentioned inter-related strings.  This phase alteration repositions the parallax of the consequently affiliated homotopic differentiation by setting up a buffer in the related semi-groups.  This activity localized as a supplement in the Imaginary tense toward the change of angular homotopy that is caused by the coaxial twists of the corresponding superstrings.  The buffer mentioned here is produced by the harmonic sway of those wave connections which were relocalized by the illuded to propagation of axions.  Such axions were generated by the tensors that here work to cause a euclidean repositioning during every instanton in which the related superstrings are in the process of being spontaneously torqued in a cohomoligical manner.  This angular momentum change would, by interacting with the mentioned "buffer", diverge the local condition of conformal invariance of the interactive traits that had been just going on previously, yet, the said change in angular momentum would then converge the association of the kinematic differentiation of the given covarince.  This is since the codifferentiation that happens with the "buffer" would act as a "check and balance" to the inertial Dirac of the given condition of homotopy.  If, after a discrete accumulation of, differentially speaking, relatively less conformal invariance, and, if the condition of homotopy has undergove global kinematics via alterations that are due to the acitivities that happen during the "space-hole", (What I call the "space-hole" is the virtual fraying of topology that happens during Ultimon Flow right before the instanton-quaternionic-field-impulse.), then the series described diverges from having a local basis of static equilibrium.  It is then that the given buffer is said to be a member of a potentially spurious eigenbasis.  Sam Roach.