Saturday, December 28, 2019
The Polyakov Action And Hyperbolic Approach
The slower that the rate is, of any given arbitrary superstring of discrete energy permittivity, when this is here to be taken in its relationship to the motion of electromagnetic energy, the lower that its directly corresponding Lorentz-Four-Contraction will consequently tend to be. The lower the Lorentz-Four-Contraction is to be, for any given superstring of discrete energy permittivity -- the higher that its directly corresponding Polyakov Action will then tend to be. The higher that the respective Polyakov Action will tend to be, for any given superstring of discrete energy permittivity -- the greater that the scalar amplitude will tend to be, of the hyperbolic approach of the correlative respective second-order light-cone-gauge eigenstates, that are of the proximal local self-same discrete quantum of energy, -- as such said respective second-order light-cone-gauge eigenstates, are here to work to interconnect the directly corresponding Fadeev-Popov-Trace eigenstate that is of the self-same discrete quantum of energy, To the initially stated superstring of discrete energy permittivity, of such a particular given arbitrary case scenario. To Be Continued! Sincerely, Samuel David Roach.
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samsphysicsworld
at
8:39 AM
Labels:
amplitude,
discrete energy permittiivty,
eigenstates,
Fadeev-Popov-Trace,
light-cone-gauge,
Lorentz-Four-Contraction,
quantum,
rate,
superstring
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