Cox Rings And Tense Of Parity

When a given arbitrary Cox Ring -- that is here of one respective ordered grouping of a set of cohomological eigenstates, is to undergo a Wess-Zumino interaction at the Poincare level, -- the said ordered grouping of such an inferred respective set of cohomological eigenstates, will tend to have a higher probability of maintaining its covariant tense of parity.  Consequently -- when a given arbitrary Cox Ring, -- that is here of one respective ordered grouping of a set of cohomological eigenstates, is to undergo a Cevita interaction at the Poincare level, -- the said ordered grouping of such an inferred respective set of cohomological eigenstates, will tend to have more of a probability of reversing its covariant tense of parity.  Sincerely, Samuel David Roach.