The Betti Action And Smooth Asymmetric Delineation

When the Betti Action is here to work to be directly associated with an even Betti number, -- the respective given arbitrary superstring of discrete energy permittivity, that is here to directly correspond to such a correlative Betti Action, is to be orientable.  When a given arbitrary superstring is to be orientable, the said string that I have inferred here, may be said to work to bear a homeomorphic field relationship, in covariance with its directly associated counter string. When a superstring of discrete energy permittivity is to be directly associated with a counter string in such a manner, to where it is here to work to bear a homemeomorphic field in its covariance with its directly associated counter string, it may consequently be said, -- that such a said field is then to bear a smoothly homogeneous Fourier-related translation.  (This particular said Fourier-related translation, is such a condition, -- to where the said homogeneous field, is here to bear a smooth relation -- over a duration of gauge-related metric.)  When there is here to be a smoothly homogeneous Fourier-related translation of field, when this is here to be taken between a superstring of discrete energy permittivity and its counter string, -- the asymmetry that is here to exist, between the stated string and its directly corresponding counter string, is here to be smoothly delineated.  I will continue with the suspense later!  To Be Continued! Samuel Roach.