The Globally Distinguishable Vs. The Substringular,Course 4, Session 3, Part 2

So, by using tangent (norm) radiation in terms of spin and orbit, the transversel and radial motion of the electrons as a unit may be defined. So, the spin-orbital interaction helps define where the electron is and is going as well as the directoral impetus. Directoral impetus is the drive that a particle has due to the way its stuff is positioned in a particular direction. As stated before, these are related to fields. Electric and magnetic. The exact magnitude and direction of the fields may vary, although the basic "ingredients" of these are constant. (One electron has a basis of one electron volt, a mass of ~9.11*10^(-31)Kg, ect...). As an electron moves and changes spot, its relation relative to other things changes. Yet, if the basic "ingredients" that define what the electron is and what it is doing become different than those that allow it to be what it is, then it is no longer an electron, it is a residue of what it was. In order for such residue that is not sued in the defining of an electron to not occur, the fields that define the differentiating boundaries of what an electron is must have a degree of harmonic oscillation. When there is harmonic oscillation, homotopies are smooth. -- Any singularities that exist work to define a lack of overt jointedness. This means that the surface areas that are described by the transition of the fields of the given electric and magnetic fields must not be broken up or jointed like a "crumbled tortilla shell", instead, these are interconnected like you would think of water. Think of light. It is a thing. A "hole" in it really isn't a hole, it is a shadow or a section that you can not see. A "hole" in light is a spot where there is no light. Light is energy formed from electrons when these drop in energy. So, electrons obey similar laws. Light is a smooth relation. electrical field interaction is a smooth relation. If electrical fields were to crumble, then their fields would bear asymptoty to each other, and would thus bear a lack of tangency. A lack of such tangency would mean that singularities would be acting upon these and would split apart the relation of the associated fields, since asymptotes in field interaction mean that the fields would no longer be tangent or touching. If the fields weren't touching, these would separate, and the electron would fall apart. Since an electron is a simple thing, it is together. Thus, it fields are interacting. Thus the homotpies of an electron must be smooth in terms of differential assortment (geometries).