Clifford Expansion, Relating To Rayleigh Scattering Of Component Parts Of Complex Manifolds

Let us initially consider a mass-bearing orbifold eigenset, -- that is here to act as the holonomic substrate of a complex manifold.  When those discrete quanta of energy, that are here to have worked to comprise such a said orbifold eigenset -- are to result in an action, by which these said quanta are to consequently diverge from each other, via a Rayleigh scattering, such an inferred general genus of a divergence, will often tend to be as appertaining to that of a general genus of a Clifford Expansion.  Furthermore; let us next consider a mass-bearing orbifold eigenset,  -- that is here to act as being of the holonomic substrate of a Real Riemannian nature.  When those discrete quanta of energy, that are here to have worked to comprise such a said orbifold eigenset, are to result in an action, by which these said quanta are to consequently diverge from each other, via a Rayleigh scattering, such an inferred general genus of a divergence, will often tend to be as appertaining to that of a general genus  of a euclidean expansion. To Be Continued! Sincerely, Samuel David Roach.