Monday, October 21, 2019
Homogenous And Spurious i*PI(del) Action
When a mass-bearing orbifold eigenset is here to accelerate smoothly in its relationship with electromagnetic energy, its directly correlative i*PI(del) action will then happen in a relatively homogeneous manner -- over the inferred evenly-gauged Hamiltonian eigenmetric, in which such a general genus of a Fourier-related activity is here to be occurring. Consequently; when a mass-bearing orbifold eigenset is to accelerate in an uneven manner in its relationship with electromagnetic energy, its directly correlative i*PI(del) action will then happen in a relatively spurious manner -- over the inferred evenly-gauged Hamiltonian eigenmetric, in which such a general genus of a Fourier-related activity is here to be occurring. As an ansantz: What I mean in this post is in reference to the general idea of rate, which is here to NOT to be confused with delineation, -- to where the latter of which is in reference to the general idea of placement. (The time-related Rate of a general genus of an activity versus the time-related Placement of a general genus of an activity. When a mass-bearing orbifold eigenset is of a Noether-based flow, the partition-based discrepancies of each individually taken superstring of discrete energy permittivity, which works to comprise the said eigenset, are to be placed evenly along the topological contour of these said strings, per each individually taken succeeding iteration of group-related instanton,-- in which this is here to be occurring, over time.) I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
Posted by
samsphysicsworld
at
2:07 PM
Labels:
activity,
evenly-gauged,
Fourier,
Hamiltonian eigenmetric,
i*Pi(del) Action,
mass-bearing,
orbifold eigenset
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