Let us initially consider one discrete quantum of energy -- of which is here to work to bear a wave-tug/wave-push, in one general direction over time. Let us say that the so-stated discrete quantum of energy of this case, is to soon alter in its specific path trajectory, in so as to then alter in the genus of its respective holomorphicity. Let us next say, that the external force -- of which is to here work to alter the directoral-based holomorphicity, that may be described of by the perturbation of the Lagrangian-based path of the said discrete quantum of energy -- is to here be of the nature of a Real Reimmanian-based charge of some kind, that is to here be delineated in a relatively Gliosis-based manner upon the holonomic substrate of the so-stated discrete quantum of energy, in what may be described of here as a relatively Rham-based cohomological-based tracing of a path trajectory, over a successive series of instantons. The tendency of such a respective given arbitrary case, will be to where the resultant Fourier-based action, that will here be enacted upon the topological surface of the inter-connective mini-stringular segmentation, that is to here work to bind the correlative respective counterstring to its correlative resepctive superstring, of which is to bind to its correlative respective Fadeev-Popov-Trace eigenstate of such a case -- will be a tendency in which the said topological surface will end-up being bent in a torsional way, just as the said discrete quantum of energy is to here be re-delineated from one substringular displacement to the next. If the directly corresponding superstring is to here be Yau-Exact, then, such a perturbative torsioning of the eigenindices of that said inter-connective mini-stringular segmentation, will tend to be bent in a completely hermitian manner. Yet, if instead, the directly corresponding superstring is to here not be of a Yau-Exact manner, then, such a perturbative torsioning of the eigenindices of that said inter-connective mini-stringular segmentation -- will tend to be bent in a Chern-Simons-based manner, over the correlative successive series of instantons.
I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
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