Post Two on More About Orbifolds

Consider the only homeomorphic paths that may hyperbollically intertwine through the stratum of an orbifold that has eigenstates of other universes within the general locus of a given orbifold. This may only be done with waves that do not have a supplementally direct wave-tug. Thus, the eigenbasis of such an orbifold's interior will always be nonabelian, in spite of whatever the abelian nature of the respective light-cone-gauge's respective eigenstates are. The tendency here is of a Yang-Mills topology that has the potential of producing Gaussian Transformations that may alter where certain universes are localized in which sections of the given orbifold. If the light-cone-gauge of such an orbifold is Yang-Mills, the arrangement of universes will form plane energy, such as the motion energy of an electron. If the light-cone-gauge of such an orbifold is Kaluza-Klein, the arrangement of universes eigenstates will form a mass. The Fujikawa Coupling of the correlative plane energy will form a photon. A Hilbert torroidal disc is like a torroidal-disc-shell except that it bears interialized Gliossi-Sherk-Olive norm states as ghost anomalies that may involve up to six more spatial dimensions than a "maxed-out" multiplicit torroidal-disc-shell. A Hilberst torroidal sphere is like a torroidal spherical shell, except that it contains interialized Gliossi-Sherk-Olive norm-states as ghost anomalies that may involve up to six more spatial dimensions than a "maxed-out" multiplicit torroidal-spherical-shell. Torroidal-spherical-shells and torroidal-disc-shells that are not Hilbert based are multiplicitly Minkowski based. A Hilbert Space may contain a "maxed-out" multiplicit Minkowski Space, yet "maxed-out" multiplicit Minkowski Space may only be contained within a Hilbert Space.