Cyclical Reverberations And Chern-Simons Singularities

Let us initially consider an orbifold eigenset, of a respective given arbitrary case -- that is to go from working to bear two consecutive Lagrangian-based Chern-Simons singularities that would work here to form one antiholomorphic Kahler condition, -- while then going in so as to work to bear two consecutive Lagrangian-based Chern-Simons singularities, that are to stem from the relative opposite direction, in so as to work to form an antiholomorphic Kahler condition that is to be of a polarized differential geometric tense from the initially so-eluded-to Lagrangian-based path, that would be formed by the initial condition of the first so-stated antiholomorphic Kahler-based state from the differential geometric condition of the second so-stated antiholomorphic Kahler-based state.  Let us next say that such a so-eluded-to general pattern, is to here repeat indefinitely for a while -- yet with minor angular abberations -- that are to here be affiliated with each of such recurring sets of Fourier-based back-and-forth oscillations.  One may then say, that such a respective given arbitrary group-metric of the said orbifold eigenset, is to here be undergoing a genus of a tense of conformal invariance -- in which case, the consecutive sets of such substringular reverberations -- may be said to here work to bear what may be termed of as a tense of cyclic permutations, when this is taken as the perturbative alterations in the Stoke's-based Lagrangian-related paths, that are to be taken by such a so-eluded-to orbifold eigenset, over time.  I will continue with the suspense later!  To Be Continued! Samuel David Roach.