When one is to take a supremum of a line of point particles, that are of a relatively non-kinematic eigenbase of Fourier-based Transformation -- one may then potentially get a postulative sphere that would then bear an additive spatial parameter of dimensinonality, that would here potentially be of a tensoric spatial dimension, that would directly appertain in this given arbitrary case to a spinor-based coniaxion -- that could here be attributed to the spinning of the so-stated spherical phenomenology of this scenario, happening here around the conformally invariant central conipoint of the directly associated coniaxial, of which is correlative to the physical existence of the holonomic substrate -- that may here be described of as the said spherical-based entity of this given arbitrary case scenario. The here additive spatial parameter of tensoric dimensionality, that is directly associated with the said spinor-based coniaxion of the directly previously mentioned case, would then be of a relatively minimal Njenhuis-based nature -- since the condition of four spatial dimensions, works to involve one more spatial parameter of dimension than what is generally conceived of in a more macroscopic manner -- yet here only, in so far as an f-field is concerned. An f-field may be typified of as the spatial dimensionality of the nucleus of an atom -- it works to concern the existence of four spatial dimensions plus time. This would then be able to work to explain the existence of the first four relateable spatial dimensions that exist at the atomic and/or at the subatomic level, as being what may be deemed of as four relatively extended or stretched-out dimensions -- that are not of a nature that may be overtly conceived of as curled-up. Yet, when one works to conceive of the existence of additional spatial parameters of dimensinonality -- one will then run-across physical dimensions that tend to be of more of a curled-up nature of dimensionality. This curled-up nature would work to describe some of the content of both d-fields and p-fields.
I will continue with the suspense later! To Be Continued! Sincerely, Sam Roach.
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