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.