During the Polyakov Action, the correlative second-order light-cone-gauge eigenstates are to undergo a general genus of a Clifford Expansion, that works here to bear mini-stringular segmentation that is to consequently be put into the process of being "fed-into" the core-field-density of the directly corresponding first-order light-cone-gauge eigenstate -- in so as to work to help at allowing for those homotopic interconnections, that are here to exist between the directly corresponding Fadeev-Popov-Trace eigenstate and its correlative superstring of discrete energy permittivity, over a correlative fractal of time. For discrete energy quanta that are of a Kaluza-Klein light-cone-gauge topology -- this will tend to generally mean, that, besides that bending of the directly corresponding second-order light-cone-gauge eigenstates, that is due to the earlier mentioned general genus of such a Clifford Expansion, as well as taking into consideration the condition, that besides the "plucking" of second-order light-cone-gauge eigenstates by their correlative gauge-bosons, -- the second-order light-cone-gauge eigenstates that are directly related to such an abelian topology, will tend to bear a relatively intrinsic supplemental wave-tug, during such an iteration of BRST. Furthermore -- for discrete energy quanta that are of a Yang-Mills light-cone-gauge topology -- this will tend to generally mean, that, besides that bending of the directly corresponding second-order light-cone-gauge eigenstates, that is due to the earlier mentioned general genus of such a Clifford Expansion, as well as taking into consideration the condition, that besides the "plucking" of second-order light-cone-gauge eigenstates by their correlative gauge-bosons, -- the second-order light-cone-gauge eigenstates that are directly related to such a non abelian topology, will tend to bear a relatively intrinsic sinusoidal wave-tug, during the course of any case of such an example of an iteration of BRST.
I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
No comments:
Post a Comment