Tuesday, February 4, 2014
The Second Part of the Fifth Session of Course 16
As the transformed directly corresponding homotopic substrate that was acted upon in the eluded to perturbative manner is altered from a Rham-based cohomology into a Doubolt-based cohomology, the eluded to holonomic entity may, on occasion, twist coniaxially -- in terms of its Ward-Caucy-based field at the Poincaire level, to where the said homotopic substrate may conform to the Gaussian condition of the directly external kinematic differentiation. This happens in enough of a scalar topological-based "quantum" of Hodge-based homotopic recycling of norm-based states, to where the eluded to internal changes in norm-coniditions may move both in the direction of being in a relaxed state, as well as acting in accordance to a fractal of the right-hand-rule in a Chan-Patton manner. So, whatever the Ward-Derichlet condition of the regions that directly surround the intially stated locus of Gaussian Transformation eigenstate are, this will then work in a simultaneous manner through a central conipoint, in so as to cause the directly related Chan-Patton conditions. If there are here no Chern-Simmons spikes in both the Lagrangian-based differentiation and the metrical-based differentiation of the activity of any said internal superstrings (that would here be of a Rham-based cohomology) during any given arbitrary group metric, then, these internal superstrings are said to be Yau-Exact.
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12:23 PM
Labels:
Chern-Simmons,
Doubolt,
homotopic,
Poincaire,
Rham,
superstings,
Ward-Dertichlet,
Yau-Exact
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