De Rham Cohomology And Orbifold Eigenset

Let us initially consider a mass-bearing orbifold eigenset, that is here to be traveling via a mappable De Rham cohomology-related Lagrangian -- over a span of time.  If such a given arbitrary respective orbifold eigenset, were to be traveling via a course of motion, that is here to be of a  binary Lagrangian, then, the said eigenset will consequently tend to be less able to be perturbated out of the inferred course of a De Rham cohomology-related projection of trajectory, than if it were to, instead, to be traveling via a course of motion, that would otherwise be of a unitary Lagrangian.  Likewise;  if such a given arbitrary respective orbifold eigenset, were to be traveling via a course of motion, that is here to be of a tertiary Lagrangian, then, the said eigenset will consequently tend to be less able to be perturbated out of the inferred course of a De Rham cohomology-related projection of trajectory, than if it were to, instead, to be traveling via a course of motion, that would otherwise be of a binary Lagrangian.  Consequently; the more "knitted" that a De Rham cohomology is to be, that is of one general nature, through which it is here to be traveling at a constant rate over time, the more difficult that it will tend to be -- for an external source to be able to alter its general flow of motion, out of the here inferred tense of a course of a De Rham cohomology.  I will continue with the suspense later!  To Be Continued!  Sincerely, Sam Roach.