Influence Of Dimensional Compactification Upon The Formation Of Chern-Simons Invariants

Let us initially consider a given arbitrary perturbative tense of an orbifold eigenset, that is here to be going through two different successive stages of motion -- over the course of two correlative respective succeeding relatively brief time periods. During the first of these said stages, the superstrings of discrete energy permittivity that work to comprise the said tense of an orbifold eigenset -- are to bear a correlative arbitrarily considered number of spatial dimensions.  After this just mentioned first stage of motion, in which such a tense of an orbifold eigenset is here to be in the process of being transferred along a Lagrangian-based path in time and space, -- the inferred eigenset of such a respective case, is then to bear a similar tense of motion as before -- except that such a cohesive set of superstrings, are then to spontaneously alter into a tense of ensuing to work to bear a lower number of spatial dimensions in time and space.  This means that the respective correlative orbifold eigenset of this particular case scenario, is here to have just been spontaneously spatially compactified into then having a smaller tense of dimensionality.  So; if basically all of the other pertinent factors of such a spatially translated cohesive set of discrete energy quanta, are to remain the same -- except for that alteration or perturbation as to here working to involve a decreased number of spatial dimensions of which such an inferred orbifold eigenset is thence to have, -- then, this will consequently tend to work to allow for the condition of a lowered scalar amplitude in that rate, by which the perturbation of those correlative Chern-Simons Invariants, that are here to be directly associated with the activity of such a said orbifold eigenset, are thence to be formed. I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.