A two-dimensional superstring has a three-dimensional field associated with it. When a relatively knit Fourier Transform that is highly Laplacian forms a torroidal structure with an annulus at its central coniaxial, the whole Majorana-Weyl supercharge associated with the operation of the associated superstring’s conformally invariant kinematism is delineated, after the group metric that forms the basically Gliossi-Sherk-Olive field described, at the outer shell general locus of that given M-field that is associated with the described kinematic differentiation of the given two-dimensional superstring’s three-dimensional field. This considers the fact that every superstring, whether it partakes of mass or not, has a mass index. Such an on-shell supercharge as taken thru a Fourier Transform that alters the spin-orbital and angular momentum distribution, delineation, and directoralization of the associated three-dimensional field toroidal structure converts the Yau-Exact indices transport in such a way as to form a discrete unit of mass as to the M-field structure that I have conveyed. This is tantamount to that a spherical shell with a physical charge in its center delineates all of the energy of its charge along the topography of its associated shell. Likewise, the norm state Ward conditions of the annulus of a toroidal 3-D field of a 2-D superstring delineates all of the angular momentum and spin-orbital distribution indices at the outer shell of that given toroidal
3-D structure. Likewise, the “figure-eight” twisted toroidal structure created by certain fermionic superstrings forms the point mass of electrons and neutrinos. This mass of certain fermions is created by this: The norm state conditions when considering the Ward conditions of the annuli of the two relatively Mobius ends of the “figure-eight” described have angular momentum and spin-orbital momentum that transfers their distribution and directoralization indices outward to the outer topology of the given “figure-eight-like” structure. The kinematic differentiation of the Yau-Exact indices of the “figure-eight” structure as a whole causes the given phenomenon to translate, thru the Fourier Transform of the given M-field thru a Minkowski or Hilbert Lagrangian, its mass indices into an integration of Hamiltonian eigenstates that allow the Kaluza-Klein phenomena, as with 3-D fields of 2-D superstrings, to convert and/or maintain as a mass. The abelian geometry of the light-cone-gauge of such Yau-Exact structures causes the E(6)xE(6) gauge-bosons related to form Schwinger indices that keep the M-fields oriented to coalesce their Noether indices into a conformally invariant manner that has to be orientable per general locus in order to translate to a proceeding general locus as long as the mass indices associated are limited. Since any M-field needs a limited Lagrangian distribution in order to delineate its Majorana-Weyl indices over a group metric that is based on a harmonics or anharmonics that may not coincide with a group directoralization of Noether flow unless the associated superstring is unorientable, Kaluza-Klein mass is always under light speed, per iteration, and mass must become Yang-Mills as in a worm-hole or Yang-Mills also, if otherwise tachyonic, which is true when mass bears unorientable yet finely directoralized motion via a Ward polarizable dark matter holomorph. Unorientable superstrings may only be as such temporarily when in a large group even if Reverse-Lorentz-Four-Contracted. Mass may become Yang-Mills and tachyonic if its field delineation is majorized.
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