Sunday, February 9, 2020
Perturbation In Type Of Expansion, During An Acceleration
Let us initially consider an orbifold eigneset -- that is here to be traveling at a constant rate of motion, as it is here to be in the process of undergoing a general genus of a Clifford Expansion, -- to where in this particular case, such a stated eigenset is here to be diverging from a given arbitrary general locus, via a correlative hyperbolic tangential flow. It (the orbifold eigenset) is then to spontaneously alter in its rate of motion, as this stated eigenset, at the same time (through the vantage-point of a central conipoint), is to be in the process of altering in its general type of an expansion, -- to where, the said orbifold eigenset is to now to be in the process of undergoing a euclidean expansion instead of a Clifford Expansion ( to where the general type of a divergence implied here, is then to alter -- from working to bear a hyperbolic tangential flow, Into then altering into working to bear a euclidean tangential flow). As such a said orbifold eigneset is to be spontaneously altering into an accelerative mode -- as it is here to be be changing in its general genus or type of divergence, at the inferred respective given arbitrary proximal locus implied here, by going from working to bear a Clifford Expansion, to then working to bear a euclidean expansion, -- this will then tend to almost indefinitely, in so long as this said eigenset is here to be undergoing a general tense of a Noether-related flow, -- to tend to work to cause, at the proximal locus at which the said orbifold eigenset is to spontaneously change in both its accelerative rate And in its general genus of expansion (to where, this is a case, in which such a general tense of a divergence is here to be perturbated, at the inferred given arbitrary proximal locus in time and space, at which the inferred dual spontaneous set of changes that I have described of earlier here, are thence to occur), then consequently; this is a general type of a situation, in which there will tend to be both the formation of one or more metric-related Chern-Simons singularities, at the proximal locus at which such a dual set of general changes are here to occur, as well as the condition that there will also consequently tend to be the formation of one or more Lagrangian-related Chern-Simons singularities, at the proximal locus at which such a dual set of general changes are here to occur. Samuel David Roach.
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5:52 PM
Labels:
Cherh-Simons,
Clifford Exapnsion,
euclidean,
Lagrangian,
metric,
orbifold eigenset,
process,
singularities,
work
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