Let us examine the reiteration contributions of gravitons, tachyonic pulse, and dilatons toward the wave-tug of one given arbitrary superstring while it exists in the general region of its world-sheet operand upon another given arbitrary superstring, based on a convergent series integration that involves both of the two mentioned superstrings and their group semi-attractors. Such group semi-attractors here differentiate in a Fourier manner in the neighborhood of the two prior mentioned superstrings' general field cohomology.: After several iterations of the two said superstrings, both of the given superstrings expand and contract due to the effect of Lorentz-Four-Contractions in conjunction with their homotopic periphery while these superstrings also wobble from side-to-side -- maintaining a central coaxial basis --, while the topological slice locants of the forces that appertain to the two said superstrings' holomorphic field cohomology bears eigenindices which here majorize in such a manner so that these said indices bend the ground condition of the substringular field basis that combines the interaction of the whole given said cohomology in such a manner so as to add a degree of tensorism to the Njenhuis-based conditions of the Ward Caucy boundary conditions that inter-relate with the holomorphic-based integrated Hodge Indices that appertain to the said cohomological field delineation that has been discussed here. When one is to consider the Dirac function that is associated with the elastic modulae of the holomorphic region of the field cohomology that inter-relates with the corresponding superstrings that we have been discussing here, any smooth torque that may be applied to the radial index that is eigen to the propagation of each of the two given mentioned superstrings that are related here in this arbitrary case forms a generation of gauge-metric that works to redistribute the coaxial-based settings of each of the two mentioned given superstrings. Such a redistribution works to alter or perturbate both the scalar and directoral basis of the directly associated Lorentz-Four-Contractions that interact with the two given superstrings over the duration of a sequential series of instantons in such a manner so that the corresponding relativistic velocity -- as well as the associated tree-amplitudes that form the Njenhuis basis of the tensorisms that are most directly applicable to such a relativistic velocity -- may here, in this arbitrary given scenario, cause a perturbation in the general limit that the said relativistic velocity would be able to spontaneously indure otherwise. If the corresponding contributions of the directly related dilatons that interact with the mentioned superstrings of the here discussed case were to work toward the formation of a Dirac function that is kinematically displayed over a Fourier Transformation that involves the said superstring via a group metric that forms an acute propagation of holonomic-based group integrands that phyiscally integrate in a convergent series over a duration of many instantons through the operand of the adjacent Fock Space that surrounds the related kinematic inter-relation, then the corresponding superstrings would then divolve their multiplicit effect over time into an obtuse "stretch", that, if such a "stretch" were then coupled by the torque that I previously described in such a manner that there were here to be a directly associated coupling in the related gravitons, then this would form tachyons. The here just mentioned tachyons would then form a Fourier-based differentiation that would be applied in a Gliossi manner in terms of the here direct pulse of their holonomic wave-tug. This would help work toward the delineation of an added degree of freedom in the kinematic differentiation of the related homotopic covariance. When such a covariance is placed in sequence with other related associations of tachyonic superstrings that are of a similar nature, this may work toward the propagation of a tachyonic generation of the directly associated object that is common here among both given sets of superstrings in the globally distinguishable. Such an activity would translate tachyonic flow until the related group Fourier differentials acting upon the Njenhuis-based topological sways of the involved superstrings would finally Reverse-Dirac the tachyonic pulse -- depending on how the fractal of the magnetic density of the whole phenomena here discussed is localized when it is relative to the general infrared photonic density. As a piecewise manner of looking at the Continuum, even harmonic series eigenstates, whose ends are de-singularized, form some basis of critical cusps in the process of their propagation. The sequence of heat eigenstates must converge upon the kerneled residual basis of the related field cohomology that is directly related here in terms of the direct field of the associated infrared photons. To go faster than the prior would here imply, the said residual basis of the related heat transfer that happens here along with the activity of the associated magnetic field must be delineated in such a manner so that there will here be a extrapoltorial basis for the determination as to how to effect the substringular function of those superstrings that are at the center of a pertainant potentially protective field.
No more said about that. I will continue with a lighter topic for session 17! Sam Roach.
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