Thursday, April 4, 2019
Resulting Veering Schwinger-Indices
Often, an orbifold eigenset -- that is here to be moving in a hermitian manner -- will interact with a set of one or more Schwinger-Indices, in such a manner, to where this said interaction, will thence work to veer or scatter these said Schwinger-Indices, into a direction that is of a relative resultant Nijenhuis manner. Such a Nijenhuis veering of this said set of one or more Schwinger-Indices, will thus tend to each, when individually taken, work to form a tense of causing a bearing of Lagrangian-related Chern-Simons singularity, -- since these waves that are here to be veering out into a relatively resultant Nijenhuis direction, when this is here to be taken in relationship to the said hermitian wave-tug of such a general case of an orbifold eigenset, that is here to tend to be propagating in a manner that is of a De Rham-related nature -- will then, in the process of such a said "veering-off" of the said scattered Schwinger-Indices, work to cause these said individually taken indices, to be changing in more derivatives, than the number of spatial dimensions that these are each to be traveling through, -- over the course of the directly corresponding evenly-gauged Hamiltonian eigenmetric, in which the said orbifold eigenset is to be traveling through, in a manner that is of a hermitian nature of cohomological translation, over time. I will continue with the suspense later! To Be Continued! Sincerely, Sam.
Posted by
samsphysicsworld
at
9:01 AM
Labels:
cohomological translation,
eigenset,
hermitian,
Nijenhuis,
Schwinger-Indices,
singularity,
wave-tug
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