If that net vibrational disturbance, that is here to be of or appertaining to a given arbitrary gravitational field, is here to be zero in net respective wavelength, -- then, the said respective given arbitrary gravitational field of such a case, is here to have a homogeneous Ricci Flow. When the Ricci Flow is here to be of a homogeneous nature, then, one may consequently say, that such an inferred directly corresponding proximal local gravitational field, that is here to be correlative to such a given case, is then to result in working to bear a flat Ricci Curvature. (A gravitational field that is here to work to bear a flat Ricci Curvature, will tend to bear a lack of a kinematic tense of gravitational perturbation.) When a given arbitrary mass-bearing cohesive set of discrete energy quanta, is here to work to be displaying the general physical attribute, of exhibiting a flat Ricci Curvature, then, one may consequently say that such a stated mass-bearing cohesive set of discrete energy quanta, is here to work to bear the general tense, of portraying a heuristic Calabi-Yau Manifold. SINCERELY, SAMUEL.
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