For every additional axial-related directoral-based sway that the said traversing path that is being mapped-out via a Fourier Transformation, there is an added degree of indiscrete tensorism that is involved with the here corresponding singularity format. For instance, if a trace that a superstring is being projected through curves through a kinematic path that is moving through a binary coaxial plane, and the said trace vibrates back-and-forth in five different codifferentiable axials over the group metric that involves the related Fourier Transformation in which the corresponding superstring that is pulled through the mentioned trace, as it is swayed back-and-forth via a coniaxial that involves five different spatial axes that are redelineated along the kinematic-based mapping of the action of the mentioned trace, as it is going through its given arbitrary Lagrangian, then, the genus of the Chern-Simmons Index -- when this is in relationship to the here non-hermitian-based singularities -- will here then be of a third-ordered euclidean Hamiltonian operator. This is on account of the condition that five axials minus two axials forms three axials, and, the existence of a tritiary coniaxial-format that extends beyond the hermicity capability of the given trace, when given the scope of the here present differential geometry, will form singularites that will here involve limits that are tantamount to numbers that are based on both infinity,infinity squared, infinity cubed, and infinity^4. The Reverse-Dirac functions of such singularities would thus be involving limits that are tantamount to numbers based on both (0+),(0+^2),(0+^3), and (0+^4). I have got to go now!
I will continue with the supense as soon as I can.
Sincerely,
Sam Roach.
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