A Floer (co)homology, that works to express a flat tense of homotopic transfer, also often tends to exhibit, being proximal local to the physical presence, of a Flat Ricci Curvature. SINCERELY, SAM ROACH.(1989).
The proximal local, piecewise continuous, physical incursion, of a viable quantum, of anti gravitational force, as it is impelled, upon the externalized spatially translatable, dimensional field, of the implicitly Ricci Smooth topological manifold, of a given arbitrary, covariant delineated, kinetically transferred, Kahler Hamiltonian Operator, may often be capable, of having the general tendency, of undoing, at least part, of the latent physical impartation, of the otherwise attributable ramifications, of the resultant, generally applicable operation, of what I term of as being, the implicit impartation, of Gravitational Topological Variance (GTs)
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