Torsion Upon Mini-Stringular Segmentation

Mini-Stringular segmentation works to form those superstringular fields, that are here to work to allow for the existence of homotopy (to where all unfrayed superstrings are here to be inter-connected, by means of a multiplicit field).  Mini-Stringular segmentation is formed, by the bead-like inter-connection of second-order point particles -- by a general phenomenology, that I term of as being called "sub-mini-string."  When there is to be the general proximal local presence of a hyperbolic convergence of mini-stringular segmentation, upon any one given arbitrary cotangent bundle that is to be approached in such a manner, there is then to tend to be more of a torsion-like activity that is here to be implemented upon the general topological stratum of such said mini-stringular segmentation, -- than instead, if there is to be the general proximal local presence of a euclidean convergence of mini-stringular segmentation, upon any one given arbitrary cotangent bundle, that is to otherwise to be approached in such a manner. To Be Continued!  Sincerely, Samuel David Roach.