Monday, November 3, 2014
Part Eight of the Second Session of Course 18
The tendency that for every holomorphically translated superstring that is subtended from a substringular encoder, there is a relatively antiholomorphically translated superstring that is subtended from a substringular encoder. This works to elude to the condition that for every holomorphically-based substringular encoder, there is an antiholomorphically-based substringular encoder. This here, then, likewise, works to elude to the tendency of the condition that, for every holomorphically translated substringular counterpart that is subtended from a substringular encoder, there is a relatively antiholomorphically translated substringular counterpart. This same general type of principle may be used to describe the basic holomorphic-based tendencies of the nature of the directly correponding Fadeev-Popov-Trace eigenstates -- as well as the condition that this may be used to describe the holomorphic-based tendencies of the nature of the directly corresponding light-cone-gauge eigenstates. Such a general genus of tendency, as an ansantz, is due to the condition that superstrings of discrete energy permittivity are directly homotopically tied in to both their correlative counterparts, their correlative Fadeev-Popov-Trace eigensates, as well as their correlative light-cone-gauge eigenstates. Such a general tendency of the holomoprhic-based behavior of the phenomenology that works to comprise discrete energy, is related to what is known of as the Campbell-Baker-Hausendorf Theorem. This works to elude to the tendency of the condition, that, for every forward-time-bearing-momenta eigenstate, there is a backward-time-bearing-momenta eigenstate. I will continue with the third session of this course later! To Be Continued! Sam.
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samsphysicsworld
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1:03 PM
Labels:
Campbell,
eigenstate,
Fadeev-Popov-Trace,
Hausendorf,
holomorphic,
light-cone-gauge,
substringular,
superstrings
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