Monday, December 24, 2018
Interim Before Session 13 Of Course 20
Let us initially consider a superstring of discrete energy permittivity, that behaves as a single unique orbifold eigenset -- that is differentiating here in a Fourier-based manner, in so as to travel through a mean Lagrangian-based path -- as potentially being of a Yau-Exact discrete quantum of mass-bearing energy. Let us say that -- if the so-stated superstring of this case were to change in two derivatives, as the said superstring is here in the process of traveling along a two-spatial dimensional Minkowski-based Hamiltonian operand, to where the thus formed genus of the singularity, that would thus be formed at the specific locus where the so-eluded-to change in concavity is here to happen -- would then be of a hermitian-related singularity, -- in as long as the cohomological-based tracing of the correlative integration of the ghost-based indices, that would thus be formed, were of a purely Real Reimmanian-related nature, to where there would here be no Nijenhuis nor Doubolt-based spurs to be considered in this given arbitrary case, in neither a metric nor in a Lagrangian-based manner. Next, let us consider here, the same initially stated superstring of discrete energy permittivity, that is acting as a single given arbitrary orbifold eigenset -- that is moving via a mean path -- through a two-dimensional unitary Lagrangian-based path, that instead, is to change all of the sudden in four derivatives, as it is still moving through a two-spatial-dimensional Hamiltonian operand, immediately prior to the so-eluded-to perturbative kinematic activity -- that would then act in so as to effect the Kahler condition of the ghost-based pattern, that would here be directly affiliated with the cohomology-based mappable-tracing, that is of the so-eluded-to bosonic superstring, of which would here work to produce the conditions of a Lagrangian-based Chern-Simons singularity, that would be of a correlative Fourier-based Hamiltonian operator, that would here potentially be of some genus of a Calabi-Yau related manifold, that would be in the process of being propagated as a Noether-based set of eigenindices, that would here occasionally work to bear an influence upon a relatively loosely knit tense of a Majorana-Weyl-Invariant-Mode, immediately prior to the so-eluded-to Chern-Simons-related perturbation. I will continue with the suspense later! Sincerely, Samuel David Roach.
Posted by
samsphysicsworld
at
11:15 AM
Labels:
Chern-Simons,
Doubolt,
energy,
Hamiltonian,
Lagrangian,
Nijenhuis,
Yau-Exact
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