A Campbell Projection is an interonncection of Campbell norm-states.
Such a Projection may scatter either other norm-states and/or this may scatter inexact and nonlinear Fock Space. Inexact and nonlinear Fock Space is comprised of first-ordered point particles that do not have an abelian interconnection between the individual first-ordered point particles described. This would mean that, in inexact and nonlinear Fock Space, you have individual first-ordered point particles that are connected to other individual first-ordered point particles by mini-string that is not supplementally norm in-between these. Such a non-abelian wave-field may be either hermitian if smoothly curved in all of the derivatives that exist in all of the dimensions that it is in, or it may be Chern-Simmons if there are indiscrete limits in the curvature of such a random neighborhood of first-ordered point particles. Since it is the tendency of phenomena to come to a state of relaxation, without Campbell ghosts, Hausendorf ghosts, Cambell-Hausendorf ghosts, and the ghosts of their Projections, point commutators would have the tendency to become to non-abelian in covariant kinematic differentiation over time.
This would produce spurious tendencies which could fray substringular phenomena.
You don't want this to happen. Such is the importance of not only ghost anomalies, that are transient, and the ability of hermitian non-abelian behavior. Yet, not to worry, the sub-mini-string interconnection in-between second-ordered point particles that interconnect and compactify to form first ordered point particles as well as the nature of sub-mini-strings interconnecting in-between second-ordered point particles to form the webbing of mini-string caused the spontaneous nature of the bending of substringular fields to have a high elastic and a high fractal modulae. This is the only way third-ordered point particles could interconnect to form the only way second-ordered point particles could interconnect to connect first-ordered point particles to each other so that homotopy may exist as well as to allow superstrings to be formed by the said first-ordered point particles. Remember, third-ordered point particles only exist where there are second-ordered point particles, since mini-string which is comprised of second-ordered point particles is what forms the field networking which allows for the interconnection of superstrings that causes homotopy to exist. Homotopy allows for interconnection so that phenomena may covariantly differentiate over time and thus exist.
I will continue with the suspence later. Have a phenomenal day!
Sincerely,
Sam.
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