Yang-Mills light-cone-gauge topology is strongly related to the condition of homotopy as well in this format of general consideration: The conditionality of every unfrayed superstring being indirectly or directly interconnected with every other unfrayed superstring is related to the condition of the general basis of Lorentz-Four-Contractions. This is due to the condition that the dual general state that all motion is relative to both the existence and the motion of electromagnetic energy is involved with the recycling of the geni of norm-state conditions. -- The recycling of the segments of unfrayed mini-string segments works to involve the activity that is involved with Lorentz-Four-Contractions, and, the general basis of the recycling of unfrayed substringular field networking -- that is performed by the indistinguishably different "manufacturing" of globally ground-states being unnoticeably altered into being of globally norm-states and vice versa -- is the general format of activity that works to both allow for homotopy and the ability for the so-stated Lorentz-Four-Contractions. The activity of the Polyakov Action -- that happens during the same metrical association as the Bette Action -- is primed by the condition of the indistinguishably different re-assortment of the so-stated conditionality of norm-states that are being altered via the existent state of homotopy. This works to indicate as to part of the general import -- that phenomena that are of a Yang-Mills light-cone-gauge topology bear upon the process of both the recycling of substringular field density, as well as the import that such geni of topology works to bear upon the condition of both homotopy and the existence of Cassimer Invariance. I will leave you with this concept.: Light, as well as the sum of all other electromagnetic energy, works to allow for the existence of special relativity, due to the just prior inter-relationship of the recycling of differential geometries with both the motion and the existence of all other physical phenomena. Electromagnetic energy that is not entropic always bears a Yang-Mills light-cone-gauge topology, and, mass as a mass always bears a Kaluza-Klein light-cone-gauge topology. This works to form the manner as to the relationships of abelian-based geometries that are of differing abelian natures. To Be Continued.
Sam Roach.
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