Simplifying The Concept of the Klein Bottle, Part One

The Klein Bottle is the phenomenon that is made as according to the Schotky Construction.  There are many individual Klein Bottle eigenstates, each of which are put together in the manner of the Schotky Construction.  A Wilson Line is a line that may be mapped in the substringular in a manner that is perfectly straight -- in spite of the conidition that space time is generally curved as it may be mapped over the expanse of the Continuum.  A Schotky Construction is a format of structure that bears two sets of orientafolds that bear one of such orientafolds that is parallel from another one that are spaced out by four Planck lengths, along with another of such orientafolds that is parallel from another one that are spaced out by two Planck lengths.  Although one set of two sides of a given arbitrary orientafold that form a box-like structure will be parallel, the other set of parallel lines that work to comprise the same said orientafold are not necessarily norm in so as to form an open parallelepiped.  An orientafold is a surface area that is shaped as either a rhombas or a square respectively, that is parallel to another surface area that is shaped as a rhombas or a square -- respectively.  Generally, an orientafold is of a square-like shape, when in terms as to how it is put together.  The orientafolds of a Schotky Construction are square-like compositions that are mainly composed of adjacent second-ordered point particles that are brought together in the said adjacent manner in such a way in which the whole surface area eluded to is filled to the maximum by the mini-string that works to comprise the composition of the sides of the said format of orientafolds.  The Schotky Construction has two sides that comprise the outer bounds of its length that are parallel and the Schotky Construction has two sides that comprise its width that are parallel, respectively.  The relative bottom orientafold of such a Construction works to interconnect the length and the width of the directly related composition that is parallel to the relative top of the said construction -- and the mentioned relative top of the said construction is open -- it is parallel  as an orientafold that is of a void of physical boundary that works to allow for the entry of the directly associated superstrings that become fully contracted when these come into the directly related eigenstate of the Klein Bottle.  This happens in so as to allow for the activity of an eigenmetric of the Kaeler-Metric.  The interior of any given arabitrary Klein Bottle eigenstate is basically filled with first-ordered point particles that are separated by a factor of 10,000 -- when in terms of the diameter of the said first-ordered point particles -- so that the said first-ordered point particles that are in the said eigenstate of the Klein Bottle are spaced-out enough to allow for enough of a lee-way in so as to allow for the spatial ability of the entry of fully-ordered superstrings.  This here is so that the said superstrings may be able to go through the individual respective eigenmetrics of the said Kaeler-Metric eigenmetric.  Gotta Go.  Sam Roach