Gauge-Bosons are essential phenomena that exist in the field
of a light-cone-gauge-eigenstate, since, when individual gauge-boson
eigenstates work to "pluck"
the second-ordered light-cone-gauge-eigenstates that exist from within the Ward-Neumman-based
field of a first-ordered light-cone-gauge-eigenstate -- the resulting
vibrations are second-ordered Schwinger Indices (the summation of such
vibrations per first-ordered light-cone-gauge-eigenstate, being a first-ordered
Schwinger Index) that flow through the Rarita Structure, in so as to allow for
the Ricci Scalar to function -- so that gravity may take effect upon
substringular phenomenology, in general.
This is just in reference to the E(6)XE(6) type of gauge-bosons. Just as adjacent electrons have to spin assymmetrically,
to give a reverse-fractaled example, in order to obey the Pauli Exclusion
Principle, -- adjacent E(6)XE(6) strings must bear an assymmetric spin-orbital
tensorism, in order to not infringe on each others' space. Such an assymmetric spin-orbital tensorism,
is caused by the spurious effect of the metrical-based Chern-Simmons field,
that exists between adjacent E(6)X(E(6) strings. Such a Chern-Simmons field is due to the
condition of such gauge-bosons -- differentiating per instanton, in-between a
discrete energy unit of permittivity and a discrete energy unit of energy
impedance. So, whether a related
light-cone-gauge topology is of an abelian or of a non-abelian
light-cone-gauge-based nature, the substringular field that binds these gauge-bosons,
to both sides of an associated first-ordered-light-cone-gauge-eigenstate -- is
primarily of a Gliosis-based abelian nature at the Poincaire level, so that the
"plucking" of the second-ordered light-cone-gauge-eigenstates will
not be of the nature to be able to shatter the given first-ordered
light-cone-gauge-eigenstate of any respective given arbitrary case. The fabric of a substringular field, is what
I call "mini-string."
Mini-String segmentation is the fabric of gauge-boson-based-action, that
works to tend to be able to interconnect the topology of all unfrayed
substringular phenomena, in so as to be able to work to help form the homotopic
structure – that is of the general eigenbases of the substringular. My website is http://www.samsphysicsworld@blogspot.com.
Sincerely,
Samuel David Roach
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