Consider a two-dimensional plane that has a trace that is displaced within it over time.
The said trace is in motion over a Fourier Transformation in a general arbitrary three-dimensional field, the motion of the trace of which moves in a common pattern during the initial part of the duration of the eluded to metric. Since the direction of the motion of the displaced trace over time is here arbitrarily considered in the z(k hat) directoral mapping format, the trace produces singularities per eigenmetric of the overall motion of its Fourier-Based mapping. Since this said trace only vibrates, in this case, in the two general dimensions that are not in the same general directoral-based mapping that relates to the axial of the direction of the said trace over time, the related singularities that are produced are related to a condition of hermicity that is here not spurious.
Now, consider the previously mentioned trace to be that of a superstring that takes into consideration its directly neighboring field in a smooth manner that bears no jointal-based curvature -- and this trace also bears no cusps. The oscillation of the trace is here of an even harmonic mode that bears no change in acceleration or deceleration. The said hermtian motion that I had described would also be on the Real-Reimmanian-Plane. Thus, the condition of the motion of such a trace would, from the vantage-point of the immediate stringular field's neighborhood, not be spurious. Such a trace is here said to be Yau-Exact.
I will continue with the suspense later!
Sincerely,
Samuel David Roach.
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