A Case Of A Wess-Zumino Interaction Being Imparted Upon A Set Of Orbifold Eigensets

Let us initially consider a covariant set of orbifold eigensets, -- that are initially kinematically moving in such a manner, that is either chaotic or at least anharmonic --  in their sequential spatial delineation, that is here to be taken via a relatively transient or brief Fourier-related Transformation.  Let us next say, -- that there is here to be an ensuing general genus of a Wess-Zumino interaction, that is then to be imparted upon what is here to be this so-inferred set of co-differentiable orbifold eigensets, in a Yukawa-related manner, -- over an evenly-gauged Hamiltonian eigenmetric.  The stronger that the scalar amplitude of this said general type of a Wess-Zumino interaction is to be, in its Yukawa-related interaction upon the general proximal local homotopic field, that is here to work to bind the given arbitrary co-determinable respective cohomology-related eigenstates, that are most directly involved with the overall Fourier-related kinematic spatial translation of the general earlier stated set of orbifold eigensets, the more likely that the said or inferred initial conditions of a chaotic/anharmonic covariant motion, that was here to be initially present at a reference-frame that was here to be at a Poincare level, that was consequently to be exhibited at the immediately external perspective to the co-determinable scene of this mentioned set of orbifold eigensets, then; this overall general condition will consequently tend to work to cause such a group or such a set of orbifold eigensets, to result in either approaching and/or reaching a tense of synchronization -- from the vantage-point of a directly corresponding central coni-point in time and space. To Be Continued! Sincerely, Samuel David Roach.