One-Dimensional superstrings are substringular vibrating strands of discrete energy permittivity. Substringular vibrating strands are ideally relatively straight, except for those loci in which there are what I term of as partitions. One-Dimensional superstrings that sinusoidally arc may be made to bear more of a topological condition of a straight Laplacian-based mapping by excentuating more of a tense of conformal invariance upon the region in which the here considered given arbitrary superstring is kinematically differentiating in, over what is here to be a tightly-knit Fourier Transformation. Take, for instance, a one-dimensional string of the kinetic energy of an electron that is here traveling at close to the speed of light. This said one-dimensional superstring is arced tremendously in several loci along its topology in a Laplacian-based mapping that may be extrapolated as sinusoidal in terms of the differential geometry of the said mapping. Let us say that the said electron is slowed tremendously to the point of being virtually at rest in this current scenario that I am now starting to describe. The given one-dimensional superstring is then put into a position to where it may be loosely straight to a relative degree from what the Laplacian-based mapping of the topological trajectory had, prior to the mentioned initial condition of the same said fermionic superstring. The only aberration now in straightness of the given one-dimensional superstring is the condition of its one or more partitions that work to comprise the said superstrings topological mapping at a snapshot of its overall Poincaire-based composition. This said one or more partitions are separations from the normal flow of the topological holonomic substrate that works to comprise the make-up of the Laplacian-based mapping of the said superstring.
I will continue with the second part of this session later! Sincerely, Sam Roach.
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