Any given arbitrary respective eigenstate of cohomology, that may be considered -- when this is taken over a respective Laplacian Transform -- will be of either a Rham-based nature, or, of a Doubolt-based nature. Any Rham-based cohomology -- when this is taken over a Fourier Transform, over a long enough duration of time -- will eventually be altered into a Doubolt-based cohomology.
I can think of 13 different types of genre of cohomology, these of which will each be of either a Rham-based nature or of of Doubolt-based nature -- when taken over a respective Laplace Transform.
These would be:
1) Gliosis-Sherk-Olive cohomologies
2) Fadeev-Popov-Trace-related cohomologies
3) Neilson-Kollosh cohomologies
4) Light-Cone-Gauge eigenstate-related cohomologies
5) Cohomologies of Schwinger-Indices, via the Rarita Structure
6) Cohomologies of Campbell-based norm-states
7) Cohomologies of Hausendorf-based norm-states
8) Cohomologies of Campbell-Hausendorf-based norm-states
9) Cohomologies of Campbell-based norm-state-projections
10) Cohomologies of Hausendorf-based norm-state- projections
11) Cohomologies of Campbell-Hausendorf-based norm-state-projections
12) The cohomological mappable-tracings of Klein Bottle eigenstates
&13) Cohomological mappable-tracings of Higgs Boson eigenstates.
I will continue with the suspense later! To Be Continued! Sincerely, Samuel David Roach.
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