When the given arbitrary projected kinematic Lagrangian-Based flow, that is appertaining to the kinematic approach, of two different and distinct individually taken Noether-Based braided cohomological topological manifolds, that are here to be of the nature, of being directly associated, with two different and distinct Noether-Based mass-bearing cohesive sets of discrete energy quanta, of which are here to work to bear a heuristic Nijenhuis tense of a uniform scalar amplitude, when this is here to be considered at the Poincare level, that is here to be taken, at the relative recursively permutative covariant center-state of their incoming approach, to where, these two different individually taken cohomological mass-bearing teams, are to spontaneously ensue, in so as to work to subsequently make a Gliosis-Based collision with each other, at the coni-center of the eigen-base, that is here to work to allow for a direct collision, as among the immediately externalized core-field-density, that is here to be situated, at the proximal local holonomic cite, of both of their individually taken net angular momentum eigenstates; this may, at times, work to allow for a dissipation, of each of their initially considered cohomological topological structures. SAM.
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