If an orbifold eigenset that is here of a Noether-based flow, is to bear a tense of motion that is go through the course of its translation from one spot to another in the substringular -- in such a manner, to where its transference through the fabric of space and time, may be described of by an interaction that is between two different distinct directorial-related equations, over the course of the same evenly-gauged Hamiltonian eigenmetric, to where such a motion-related path is NOT of any tree-amplitude-based nature, -- then, one may say here that the path of the said orbifold eigenset -- as it is here to be translated from one spot to another in such a manner -- may then tend to be described of as to here be moving through a binary Lagrangian-based path. Furthermore -- if an orbifold eigenset that is of a Noether-based flow, is to bear a tense of motion that is to go through the course of its translation from one spot to another in the substringular -- in such a manner, to where its transference through the fabric of space and time may be described of by an interaction that is between three different distinct directorial-related equations, over the course of the same evenly-gauged Hamiltonian eigenmetric, to where such a motion-related path is NOT of any tree-amplitude-based nature, -- then, one may say here that the path of the said orbifold eigenset -- as it is here to be translated from one spot to another in such a manner -- may then tend to be described of as to here be moving through a tertiary Lagrangian-based path.
I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
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