Harmonics Of Schwinger-Indices

When a given arbitrary Fadeev-Popov-Trace eigenstate, is to vibrate in a harmonic manner -- it tends to be correlative to the consequent proximal local formation of harmonic Schwinger-Indces, -- of which will then tend to work to form a Wess-Zumino influence, upon the adjacent eigenstates of the four general categorizations of the basic forces of nature.  Consequently; when a given arbitrary Fadeev-Popov-Trace eigenstate, is to vibrate in an anharmonic manner -- its tends to be correlative to the conequent proximal local formation of anharmoncic Schwinger-Indices, -- of which will then tend to work to form a Cevita influence, upon the adjacent eigenstates of the four general categorizations of the basic forces of nature.  To Be Continued!  Sincerely, Sam Roach.