When the Ricci Flow is to work to bear a hermitian-related nature, then the correlative Ricci Flow is said to tend to be smooth. When the Ricci Flow is smooth, then the correlative Ricci Curvature tends to be flat. When the Ricci Curvature is flat, then the correlative mass that is involved here, tends to be of a heuristic Yau-Exact nature. This tends to be the case, when the proximal local gravitational force, that is here to be of such a given arbitrary case scenario, is here to Not be perturbative. Furthermore; When the Ricci Flow is to work to bear a spurious-related nature, then the correlative Ricci Flow is said to tend to not be smooth. When the Ricci Flow is not smooth, then the correlative Ricci Curvature tends to not be flat. When the Ricci Curvature is not flat, then the correlative mass that is involved here, tends to Not be of a heuristic Yau-Exact nature. This tends to be the case, when the proximal local gravitational force, of such a given arbitrary case scenario, is here to be perturbative. SAM.
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