What ramifications as to energy flow are due to permutations in the radial tensors of a set of one and two-dimensional strings that quantify to form the phenomena of a trait which is covariant with another one? A sequence of one and two-dimensional superstrings wobble in a region which centralizes locally to their respective neighborhoods as a kinematic eigenmatrix of reiterations which expel harmonic wave residue. This happens after the convergence of the series output of the related superstrings, of which delineates homotopic residue. The ghost residue renormalizes in conjunction with the directly related point commutators which act as eigenstates to the Imaginary radial tensors of the transversal anharmonic nodal indices. This bears Yakawa Couplings with the mentioned superstrings' Fock Space. As these strings wobble as described, the anharmonic node indices converge upon a harmonic wave delineation at a discrete measure in the substringular, bearing an instanton interaction of a discrete metric. This said metric acts to Dirac the quaternionic reiterative strings' metric, while then sequentially compactifying to a euclidean measure, after which stretching the relatively local strings which are associated with that partial encodement of the associated given covariant trait. As the metric of the wobbling strings relapses, the Poincaire generators, which distribute the partial integration of such associated parameters, varies in terms of each separate variable of the given trait. This happens in order to: 1) Get a given substringular trait to differentiate as a whole in a Fourier manner relative to another given substringular trait.; & 2) To gen a substringular association to act as a strung-out substrate that normalizes the correlative critical cusps of each jointal singularity that was previously seperated by the harmonic discharge of the corresponding field propagation in the substringular.] The Poincaires that are related as such in this case can do this because of the prior mentioned Fock Space encodement. This type of compactification that I just described causes substringular membranes, which, via the associated angular momentum that is associated here, delineates substringular operands thru which the said topological phenomena may be distributed into in order to allow discrete energy to flow -- so that energy may exist at all.
When I find the test questions that I have for the end of Course Nine, I will submit a post for that.
I will continue with the suspence later! Take Care. Sincerely, Sam Roach.
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