Here Is Some Knowledge To Help You To Better Understand Sub-Mini-String

Sub-Mini-String is what interconnects both third-ordered-point-particles to each other as well so as to interconnect second-ordererd-point-particles into the type of mini-string that forms the fields that are exhibited by superstringular phenomena.  First-Ordered-Point-Particles are formed by the "yarning" of mini-string into the various forms of compactifications that allow for the respective various forms of first-ordered-point-particles that exist in the arena of space-time-fabric.             
Sub-Mini-String segments bind via an extreme fractal example of a pressurized vacuum.  Ideally, one would think that sub-mini-string segments would be flushly homeomorphically cylindrical.  Yet, the ends of the segments of sub-mini-string are not necessarily a fractal of cross-sectional orientafolds.  Often, either end and/or both ends of sub-mini-string segments are conically angled by up to 11.25 conical degrees if one were to observe such a conical angling at such a close range that a given arbitrary sub-mini-string segment would here appear to be three-dimensional.  Such an angling may be singularized, trivially isomorphic when one considers both ends of such a mentionable segment, or non-trivially isomorphic when one considers both ends of such a mentionable segment.  So, when such a said segment is non-trivially isomorphic at its maximum conical slanting at both ends, the overall conical angling difference would, in under a Laplacian condition, be a 22.5 degree difference.  This coincides with the condition that a Higgs Action eigenstate subtends to an angling of 22.5 degrees to the relative left of a relatively straight up and down subtending when a Klein Bottle eigenstate is to move holomorphically and that the same arbitrary Higgs Action eigenstate subtends to an angling of 22.5 degrees to the relative right from a relatively straight up and down subtending when the respective Klein Bottle eigenstate is to move antiholomorphically under the same eigenmetric of any arbitrary Kaeler-Metric eigenstate.  Either way, when one considers a Wilson Line that measures the general length of a sub-mini-string segment, the length of that segment is always 16 times as long as its thickness at its center.  Sub-Mini-String is always the same thickness.  Again, this is not a length that is derived by a theoretical Gliossi-based Laplacian measurement, yet, this considered length, which is always the same, is based on a Wilson Line that measures the general length of any given sub-mini-string segment.  Here is what I mean.  Take both ends of any of such said segment.  Consider pseudo-orientafolds that extend "above" or "below" a given segment that we are discussing.  Draw a line that is straight that connects the orientafolds.  That given line will always be the same length, whether the said segment is homeomorphically cylindrical, conically angled at one end, trivially isomrphically conically angled at both ends, or non-trivially isomorphically conically angled at both ends.  This is what I mean by a Wilson Line.  The ends of sub-mini-string always flushly touch in a Gliossi Manner, whether the given ends are conically angled or not.  This goes to show that the slanting of the conically angling of the ends of such said sub-mini-string segments are always bimorphologically isomorphic to the degree that such segments are angled.  The number of variations of such slantings is the following:  Take the reciprocal of
(~1.104735878*10^(-81)), and divide this number by 16.  During the space-hole, the relatively forward holomorphic ends of the segments of sub-mini-string that bind those loci of mini-string (reverse-fractaled of sub-mini-string) that are to temporarily disconnect to retie before the quaternionic-instanton-field-impulse-mode.  Such a sub-metric of brief disconnection is due to the virtual lack of a fractal of pressurized vacuum in loci of substringular field.  Based on the Laplacian condition that is in consideration of the placement of the substringular field eigenstates as this is happening, the sub-mini-string segment ends that nearly break homotopy reconnect in the manner that involves the least resistance.  This retying is what allows for the continuation of Gaussian Transformations, of which allows for the spontaneous kinematic covariance that is essential for metric-gauge to be activated so that superstrings may be discrete energy so that reality may continue.  I will continue with the suspence later.