Some Stuff As To Minkowski-Based Orbifolds

If  two orbifolds that are adjacent are flat -- or, Minkowski-based -- then, the two orbifolds have, in this given arbitrary scenario, a composition that consists of two sets of superstrings that perform two different specific functions each, respectively, that would here involve two sets of superstrings that bear a unitary-based adjacency the one toward the other.   This would mean, here, that each superstring of one of the two given arbitrary orbifolds are then here adjacent to one of the superstrings of the other given arbitrary orbifold.  So, if the Planck phenomenon of one of the superstrings of discrete energy permitivity that works to comprise one of the orbifolds that I have here mentioned is adjacent to the Planck phenomenon of one of the superstrings of discrete energy permittivity that works to comprise the other given arbitrary orbifold that I have eluded to in this case, then, the two orbifolds of this case scenario are of the same universe.  This is because all of the superstrings of any given arbitrary orbifold are of the same universe -- since an orbifold is a set of superstrings that work to operate in so as to perform one specific function.  So, if one superstring of one given arbitrary orbifold is of the same universe as another superstring of another given arbitary orbifold, then, the two just mentioned orbifolds will be of the same universe.  I will continue with the first part of the fifteenth session of course 14 later!  To Be Continued!  Sincerely, Samuel David Roach.