Piecewise Continuous Transference of De Rham Cohomology

The more piecewise continuous that the motion of an orbifold eigenset, that is here to bear the transference of a De Rham cohomology, is to be expressed as, the more Yau-Exact that such a said orbifold eigenset, that is of a De Rham cohomology, is to tend to be translated as. This is the tendency in a Lagrangian-related manner -- because if such a cohomology is to be traced in a piecewise continuous manner, -- it will tend to only be changing in as many derivatives as the number of spatial dimensions that it is here to be moving through -- over the so-eluded-to duration, of a given arbitrary proscribed sequential series of group-related instantons.  Furthermore -- this is also the tendency in a metric-related manner, -- because if such a cohomology is to be traced in a piecewise continuous manner, -- it will then tend to maintain its tense of a dimensional-related pulsation, as well, through this so-eluded-to duration, of such a given arbitrary proscribed sequential series of group-related instantons.  I will continue with the suspense later!  To Be Continued!  Sam.