Let us consider a case scenario in which a superstring is projected through a smooth planar curvature in a three-dimensional field in which the shape of the elluded to trace that is thus formed over time is sinusoidal in nature. The trace vibrates over a Fourier Transformation in a harmonic manner initially. At one point after the initial vibrational-mode of the said trace, the kinematic projection of the mentioned trace bears an anharmonic pulse that involves a truncation in the sway of the vibration of the kinematic projection of the corresponding superstring that is here moving over time. The related spot where the truncation happens here is during a point in which the given arbitrary superstring has just reached the point at which it is trying to change in concavity. (The superstring has here just reached the point where there is to theoretically to be a change in the second derivative of its curvature.) On account of the anharmonic truncation of the vibratorial oscillation of the trace -- the just mentioned trace, here, being a kinematic projection of a superstring --, causes the trace to not end up changing in concavity at the point in which it normally would, on account of the prior mentioned truncation of the corresponding harmonic mode of its vibratorial oscillation. As an ansantz, this is due to the mathematical condition that infinity*0+ = 1, and not infinity. (Or, also, infinity*0(-) = -1, and not -infinity.) This condition will here cause the mentioned trace to need to reorganize in so that it may actually change in concavity at some future spot, during the translation of the projection of the said given arbitrary superstring over an ensuing metric that involves the here continuing Fourier Transformation of the kinematic motion of the related superstring that we are discussing here. Yet, if the anharmonic sway of the vibratorial oscillation of the type of trace that I am here discussing is instead bearing an ellongation of its vibratorial sway over an eigenmetric that is part of the overall metric that involves the projection of such a format of substringular motion of a discrete unit of energy permittivity over time, then, the concavity of the curve will still change at the right spot -- if the action of the said ellongation of the vibratorial oscillation that would otherwise be harmonic is made anharmonic right at the spot in which it would tend to change in concavity. Yet, such a motion would form an additional coefficient of singularity that acts as a multiple of infinity or as a multiple of negative infinity -- based on whether the mentioned ellongation is in the positive holomorphic direction or in the negative holomorphic direction, repectivley. Such an ellongation in the prior harmonics would then form a tense of spuriousness that would form a detectible jointal-based spike in the relationship of the projection of the kinematic motion of the here discussesd superstring. Spuriosness, as such in substringular cases, will always involve at least one instanton of an abberation from Noether Flow.
I will continue with the supense later! Sincerely, Sam Roach.
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