An Explaination Of Topology

Superstrings are comprised of first-ordered point particles that integrate into the general shape-like formats of either vibrating strands or vibrating hoops that form the discrete energy that makes-up the Continuum. Superstrings are generally vibrating hoops of such phenomena. First-Ordered point particles are "yarned together" mini-string that forms the general compositional genus of tiny spheres that organize to form the prior mentioned superstrings. The mentioned vibrating hoops are bosonic strings -- of which are primordially considered as two-dimensional. The mentioned vibrating strands are fermionc strings -- of which are primordially considered as one-dimensional. This does not directly consider the condition of heterotic superstrings, even though heterotic strings are completely real. This goes beyond the scope of what I am discussing here. The prior said mini-string is the fundamental basis of the topology that works to form the basis of substringular fields. Superstrings are primarily interconnected by the said mini-string. Topology is the general term for the "substance" that forms both the Poincaire-based and the Clifford-based interconnectivity that works to form the respective composition and the networking of superstrings -- in so that superstrings may not only exist in such a manner in so that these may be able to operate as the discrete foundation for the existence of energy, yet, also, so that superstrings may be able to bind into a covariant relationship that allows these said superstrings to be able to interact in both a direct and in an indirect manner. The said topology interacts in both field-based segments and in field-based curvatures that cause both the Laplacian-based mapping of the "topography" of superstrings, as well as to be able to cause the Laplacian-based mapping of the "topography" of the field indices that work to interbind the said superstrings, to act as the operational basis as to what this said topology is. The interconnectivity of all unfrayed topology to all other unfrayed topology per instanton is homotopy. The tendency of the said homotopy is the foundation of Cassimer Invariance. Sam Roach.