Most Ideally Suitable Gravitational Tense Of Field For Yau-Exact Conditions

 The general tense of a gravitational field is most ideally suitable, in order for a mass-bearing cohesive set of discrete energy quanta to be most facilitated -- in being able to generate as much cohomology as it is here to be degenerating, in a piecewise continuous manner, over a proscribed duration of time (as this is here to be considered, over the durational span of a sequential series of group-related instantons) -- when the directly corroborative respective Ricci Curvature, which is to be effectual for such an inferred set of energy quanta, is here to be of a correlatively Flat nature. (A Flat Ricci Curvature is Ideal, for the physical conditions to be present -- in which a directly corresponding mass-bearing cohesive set of discrete energy quanta, that is here to be directly applicable in such an inferred Ward-Cauchy-related environment, is thence to be most facilitated to be able to generate as much cohomology as it is to degenerate -- in a piecewise continuous manner, over a proscribed duration of time.) Heuristic Yau-Exact phenomenology, tend to be mass-bearing cohesive sets of discrete energy quanta, that are here to be of such a nature, to where these are to be generating as much cohomology as these are here to be degenerating, in a piecewise continuous manner, over a proscribed duration of time. Therefore; The general tense of a gravitational field is most ideally suitable, in order for a mass-bearing cohesive set of discrete energy quanta to be most facilitated, in being of a Yau-Exact manner of nature, when the directly corroborative respective Ricci Curvature, is here to be Flat. Therefore; A heuristic Yau-Exact manifold, tends to be of a mass-bearing cohesive set of one or more discrete energy quanta, that are here to be working to exhibit the correlative respective physical attribute, of being directly effected by a gravitational field, that is here to be displaying the condition of working to bear a Flat Ricci Curvature. To Be Continued! Sincerely, Sam Roach. (1989).