Recycling of Differential Geometries

So, describe the general shape of a tori sector, using descriptions of individual parts of such a sector, and integrating these parts into a description of a tori sector as a whole. A tori sector is a discrete increment of an ultimon, each of the increments of which forms a basis for the formation of a singularization that acts as the basis of one photon in every space-time-potential that exists for its given encodement in its given relative sector in the Continuum.: In order for there to be reality, there must be some order. For without order, there is no cognizance. And without cognizance, there is no association. Without association, nothing is near each other. And if nothing is near anything, then nothing would exist. Yet we observe. Observation is a form of cognizance. Thence, there is reality and therefore order. In order for there to be order, information needs to be communicated. In order for there to be an overall reality, there must be overall cognizance. In order for there to be overall cognizance, information from the most incremental wave packets that commute as a group thru the ultimon must be partially shared to every other packet of condensed oscillation that circles the Ultimon. In order for there to be any organization among these packets of condensed oscillation, these packets or points must bear a symmetry with other points that exist in the ultimon. These points find each other because, after communicating partially to every other point, similar spin-orbital-interaction modes and angular momentum modes, which must exist since if all distinctions differentiated from each other by infinity, the points would Reverse-Dirac into nothing, among points bring these into their surroundings. This is among point particles brought into their surroundings. This symmetry, along with their nearness, causes their neighborhoods to touch. Such spontaneous tangency causes straight lines of points to form, since 90degrees*2=180degrees= a straight line. Yet there is a situation. These points need to bear a degree of tangency in the direction that these want to head. so, picture you're looking at the top point. If you made 90degrees with this relative to the rest of the line of points, you would have a point right in front of it and parallel to that line segment. Do this to the whole original string. Now, the string is half empty and only has one wave to itself. It needs an orientation of more waves. The new orientation provides the waves and is the Fock Space orientation. It may be parallel to the Real string in a variety of neighborhoods, depending on what the subsequent impetus of the Real string would be. Now when the strings of a tori sector are forming, these need all of the related strings to release their Real residue in order that some of the unused residue that these strings need from other strings in that sector may become integrated into their point-fill. the release of residue happens as I previously described, and the collection of residue happens when it scatters within the sector until it finds a home. The symmetry of having the related strings of the tori causes their residue to be released toward their center state. This is called the Quaternionic-Field-Impulse.