Some More Stuff, As To Isotropically Stable Superstrings

When a superstring of discrete energy permittivity -- whether such a said superstring is to be of either a symplectic geometry or of a Khovanov geometry, is to be working to generate as much cohomology as it is here to be degenerating, -- over the course of some discrete evenly-gauged Hamiltonian eigenmetric, -- and if, as well, there is here to be the Ward-Cauchy-related condition physical present here, in which the said superstring is to basically act as "one unit," as it is to be undergoing the general course of its translation through space over time, -- to where the topological surface of such an implied string, when this is here to be taken at a level that is Poincare to the general region that is "barely" external to the holonomic substrate of the here mentioned topological surface of this said superstring, is to bear a relatively consistently minimal topological "rippling" of its inherent homotopic indices of vibrational oscillation, then, one may say that such a said superstring of discrete energy permittivity, will consequently tend to bear an isotropically stable nature, that is known to act as being of a Floer (co)homology. Sam Roach.