When a given arbitrary Noether-Based cohesive set of discrete energy quanta, is to be proximal local to the eminent physical presence of a flat Ricci Curvature, it may often tend to consequently result, that the inferred respective Hamiltonian Operator, (the earlier stated (Noether-Based) cohesive set of discrete energy quanta), will thereupon spontaneously have the general physical attribute, of working to express a smooth Gaussian Riemann Surface, as taken at the Poincare level, to the externalized topological surface, of the region of core-field-density, of which is here to work to form the cohomological "shell," that is here to tend to be formed, (in case you are new at this), by the interaction of the Lagrangian (the energy of motion) of the stated Hamiltonian Operator, with its immediately external environment. This implies part of the reason, as to what works to facilitate the formation, of a heuristic Kahler Manifold. SAM.
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