Consider the cohomological mappable path, that is here to be, of the Lagrangian of a given arbitrary Hamiltonian Operator. Consider both the Clifford-Related Expansion, and, the Euclidean-Related Expansion, that are of the correlative Laplacian-Based setting, that is here to be directly associated, with the projected trajectory, of such an earlier stated cohomological mappable path. The quotient that is eminently perceivable, as being the resultant physical attribute, that is here to exist, when one is to mathematically consider the expression, that is of the stated Clifford-Related Expansion as being divided by the stated Euclidean-Related Expansion, to where this may often be consequently thought of, as being eminently associated with the Kahler-Related Quotient, of the homotopic transfer, that is here to often tend to be corresponding, to of the relatively piecewise continuous homotopic transfer, of the cohomological flow, of the mappable-tracing of the Lagrangian-Based path, that the earlier stated Hamiltonian Operator, is here to have just endeavored to work to form, in the general process of the multiplicity of its propagational conveyance, along the generally conceived of reductional topological manifold, that is of the perpetually curved Hamiltonian Operand, that is here to consequentially be eminently associated, with the projected trajectory of the Rarita Structure, that is here to work to form the multiplicity of interconnection, amongst the energy-related phenomenology, of the general panoply of space-time-fabric. TO BE CONTINUED! SINCERELY, SAMUEL DAVID ROACH. (1989).
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