Membrane-Format of Various Orbifolds

The structure of orbifold eigensets that are not singularly are not 100 percent filled with the topological substrate of orbifolds. The structure of orbifolds is not 100 percent filled with the topological substrate of superstrings.  The exterial range of the core field density of superstrings is not 100 percent filled with the topological substrate of mini-string.  The interial core field density of superstrings is, though, comprised of relatively compactified mini-string segments.  Mini-Strings segments that are Gliossi in kinematic contact are homotopic in terms of their respective Majorana-Weyl Invariant mode.  As long as a substringular field is homotopic, the directly related mini-string segments are not frayed.  Yet, an orbifold eigenset and/or an orbifold is not pure mini-string that is compactified.  So, an orbifold may often be semipermeable with another orbifold and/or orbifold eigenset over the course of its kinematic translocation through a discrete Lagrangian.  Likewise, an orbifold eigenset may then be able to often be semipermeable with another orbiofld and/or an orbifold eigenset over the course of its kinematic translocation through a discrete Lagrangian.  Often, such membranes that occupy the same general substringular neighborhood at the same time are not of the same universe.  Orbifolds and/or orbifold eigensets that are not of the same universe are not of a Real-based spatial comparison when corresponding to one another.  Such a co-relation may be extrapolated when in terms of Li Algebra.  I will continue with the suspense later!  Sincerely, Samuel David Roach.