Isotropic Stability And Tense Of Cohomology-Related Degeneration

If the cohomology that is here to be formed, by the motion of a set of one or more mass-bearing superstrings of discrete energy permittivity-- that are here to be moved along at a relatively external reference-frame, by a set of one or more superstrings that are of a Legendre homology --  is to bear such a condition, --  to where the said contingent set of superstrings of a Legendre homology, that are here to be in the inferred process of "tugging-along" the said set of mass-bearing superstrings, are to work to bear an isotropically unstable (co)homology, then, such a resultant cohomology, that is said here to have been formed by the earlier mentioned motion of the said set of one or more mass-bearing superstrings of discrete energy permittivity, that are to be operating in so as to perform one inferred common function, are then to tend to bear more of a degeneration of cohomology, than if, instead, the Legendre (co)homology that is here to be "tugging-along" the said mass-bearing set of superstrings, were to otherwise work to bear an isotropically stable condition.  Sincerely, Samuel David Roach.