Ricci Flow And Stringular-Related Structural Fortification

The higher that the scalar magnitude of the Ricci Flow is to be, as this is here to be applied to the cohomology-related stratum of any one given arbitrary Noether-related orbifold eigenset, if and when it is here to be maintaining a constant acceleration,  -- the more diffeomorphic that the Ward-Cauchy-related condition of such a said orbifold eigenset will consequently tend to be, as this is here to be considered along the Laplacian-based topological flow of the correlative cohomology-related eigenstates -- per correlative iteration of group-related instanton -- to where these said cohomology-related eigenstates are here to work to form the overall cohomology-related stratum of such a said eigenset, as this is then to be taken at a level that is Poincare to the orbifold eigenset -- due to the resultant net increase in the hermitian nature of the metric-related flow of those cohomology-related eigenstates, that work to comprise the outer shell of such a said eigenset -- this may then happen, to where the tense of such a general genus of activity, may often result in such a substringular situation, to where such an inferred orbifold eigenset will consequently tend to increase in the scalar amplitude of its structural fortification, on account of this. Sincerely, Samuel David Roach.