The math as to what phenomenon is in what relative covariant layer of reality is based upon the curvature angles that may be subtended between two or more conicenters of light-cone-gauge eigenstate-based hyperbolic curvatures at the metrical center of eigenmetric of a Polyakov Action that works to appertain to different respective codeterminabe, covariant, and codifferentiable discrete units of energy.
So, let us say that in the middle of a given arbitrary Polyakov Action eigenmetric, two different adjacent discrete units of energy have their directly corresponding conicenters of light-cone-gauge eigenstates at a subtended angle that averages at 90i degrees -- the one relative conicenter of one light-cone-gauge eigenstate that has just achieved its directly associated Clifford Expansion relative to another relative conicenter of another light-cone-gauge eigenstate, that has also simultaneously (through the vantage point of the center of the proximal extrapolation) achieved its directly associated Clifford Expansion. This just mentioned condition of angling would work to determine both said discrete units of energy as belonging to the same genus of codeterminable layer of reality -- even if both of the said discrete units of energy were not of the same universe.
If two different discrete units of energy that are of the same genus of codetermiable layer of reality are off of adjacency by one layer of substringular stratum, then, the angle of subtention that may be extrapolated from the conicenter of one of the two directly corresponding light-cone-gauge eigenstates to the conicenter of the other given light-cone-gauge eigenstate -- at the center of the duration of the directly associated dual Polyakov Action eigenmetric -- would be 32pi(I)/63 degrees. So, if the said two different discrete units of energy were off of adjacent by 63 layers of substringular stratum, then, the angle of subtension that may be extrapolated from the conicenter of one of the two directly corresponding light-cone-gauge eigenstates to the other given light-cone-gauge eigenstate -- at the center of the duration of the directly associated dual Polyakov Acton eigenmetric -- would be 32pi(I) degrees. The format of angle that would exist at another layer off of adjacent would then be 32pi(I)/65 degrees.
So, if the codeterminable layer of reality of two different discrete units of energy are off of adjacency by 159,000 layers of substringular stratum -- when under the conditions of universal history here involving no layers of reality being completely frayed -- then this would here involve an angle of subtension between the conicenters of their light-cone-gauge eigenstates at the simultaneous (through the vantage point of the center of the proximal extrapolation) center of the dual duration of Polykov Action eigenmetric -- would again be 90i degrees. Yet, if 9,000 layers of reality were completely frayed at a given moment in universal history, and if also the said format of subtension of 90i degrees happened instead at 150,000 layers of substringular stratum off of directly adjacent, then, at this point instead, the two directly eluded to discrete units of energy would here be of the same layer of reality.
Again, to sum up the main consideration that works to determine what is to be the correlation as to the covariant layer of reality that one discrete unit of energy is from -- relative to another covariant layer of reality that another discrete unit of energy is in is based upon the subtention of angle that the conicenter of one first-ordered light-cone-gauge eigenstate at the conicenter of one Polyakov Action eigenmetric bears relative to the conicenter of another first-ordered light-cone-gauge eigenstate of the other extrapolated discrete unit of energy at the dual state of the same dual Polyakov Action eigenstate during a given arbitrary group instanton. This differs from the determination as to what universe that one discrete unit of energy is in relative to another one -- the latter of which, instead, involves the angle of subtention that exists between two different covariant Fadeev-Popov-Trace eigenstates.
This is for one set of parallel universes. I will continue with the suspense later! Sincererly, Sam Roach.
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