Wednesday, October 30, 2019
About A "Buffer" Between Orbifold Eigensets
That general genus of the activity of a phase alteration, from among a set of covariant substringular traits, to where each of such "traits," is here to act as a set of interdependent orbifold eigensets -- that work to re-position the parallax that is here to exist, between those eigenstates that are eminent in their correlation to that directly corresponding homotopic differentiation, that is here to exist in relation to the proximal local kinematic activity of the general course of the i*PI(del) action -- is here to act indirectly as a "buffer," by working to allow for the efficient interdependent motion of the inferred semi-groups, that are here to phenotypically be exhibited as the earlier inferred sets of orbifold eigensets. This is because the co-differentiation of the said traits with the said "buffer," would act as a physical "check-and-balance" to the inertial Dirac of the given homotopic condition. If, after a discrete series accumulation of differential variance, and, if the homotopy that is here to be correlative, has here to have undergone such global kinematics in a viable Fourier-based manner -- to where the said covariant traits are then to gradually move into the "direction" of getting caught-up into a common functional operation that is to consequently "synchronize" into a common general theme of kinematic activity, then, the said series that is here to have been eluded-to, will then tend to consequently have converged upon a local basis of operational-related function. To Be Continued! Sincerely, Samuel David Roach.
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samsphysicsworld
at
10:00 AM
Labels:
buffer,
covariant,
i*Pi(del) Action,
motion,
phase alteration,
traits
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