Let us initially consider a mass-bearing orbifold eigenset -- which is a set of mass-bearing discrete quanta of energy, that operate in so as to perform one specific function, over a sequential series of group-related instantons -- that may be be described of via a Fourier Transform, that is of an evenly-gauged Hamiltonian eigenmetric. The directly corresponding mass-bearing superstrings of discrete energy permittivity, that work to comprise the said mass-bearing orbifold eigenset, are each, individually taken, as working to bear a symplectic homology -- which may be described of as being cohomological entities. The generation of the Lagrangian of such cohomological entities works here, in so as to help in the delineation of superstrings that are here, individually taken, to exhibit a tense of working to bear a Legendre homology. What I am describing here -- is that the generation of the actual motion of the closed-strings that are of a mass-bearing nature -- works to help here at delineating the proximal local presence of isotropically stable superstrings, that are here of the nature of plain kinetic energy. The so-eluded-to multi-dimensional delineation of the said Legendre homology, of which is here of the nature of being a tense of plain kinetic energy -- is to work to bear a path-related bundle, that is here to work to involve the proximal local presence of the condition of Chern-Simons Invariants. Let's next say that each general directoral-related partial function, that is correlative to the said path-related bundle -- is to be expressed in this given arbitrary case -- as one quadratic-based equation. Let us next say that the said path-related bundle is here to involve the presence of eight covariant, codeterminable, and codifferentiable spatial parameter-related physical dimensions -- that may be expressed in a manner as being of a product of eight of such so-eluded-to directoral-based quadratic equations, -- as to here to be appertaining to working to help at describing the Lagrangian-based path of the earlier-mentioned Legendre homology, that is of a multidimensional open-loop of substringular topological stratum. If one were to then to consider the product of four of the eight of such directoral-related equations, that are here to help at working to describe the path-related bundle of such a Legendre-related superstring -- as it is to here to be working to exhibit the attributes of the Ward-Cauchy-related conditions of its correlative Chern-Simons Invariants -- and, if one were to then to take the overall expression of the said Chern-Simons Invariants of such a Legendre homology in the said exhibition of the so-eluded-to eight spatial dimensions, and if one were to then to divide this expression by the product of the earlier-mentinioned respective given arbitrary path-related bundle of the respecitve given arbitrary four directoral-related equations, -- this will then tend to indicate, what would here amount to an attenuation of the dimensional-related pulsation of the said correlative Legendre-related homology. Such an attenuation of dimensional-related pulsation, will then work to form the presence of a set of one or more proximal local metric-based Chern-Simons singularities that are of a dampening nature, over time.
I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
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