If the Lagrangian-based path of an orbifold eigenset, is to not only to be completely hermitian in the mappable-tracing of its covariant-based motion (in so as to be working to bear a De Rham cohomology), as well as the condition that such an orbifold eigenset is to here be moving, in so as to be displaying a trajectory-related course of motion, that is as according to only one common directorial-related equation of motion -- that is here to be translated over the span of an evenly-gauged Hamiltonian eigenmetric -- then, one may then tend to say that the Hamiltonian operand in which the said orbifold eigenset is here to be moving through, over time, may be thought of as being as a tense of what would here be a unitary Lagrangian-based path.
I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
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