Grand Unified Field Theory: (See the post, Enhancement Of The Kahler-Metric, from March of 2023).
Introductory Explanation:
What The given arbitrary equation, of which utilizes, what I term of as being, trinomial eigenstates, is to be acting to describe, Are the attributes of physical nature, of a given region in time and space, as heuristically contingent, upon its environment.
For any region of Stoke’s-Based field, in which 1<N<= 26; ( where N is an integer) — To where this is to be the case, for the mathematical situation of SERIES, that I have provided; (Yet; When in lieu of, as to what the “knot” of trinomial eigenstates happens to be, for that particular region, (that is, when working to determine the knot of trinomial eigenstate), the value of N, refers to a Cotangent Bundle, that will be anywhere from 3 to 96 (since this utilizes Chern Simons Theory)). Furthermore; Although, as everyone in math tends to know, in Euclidean use, the natural log of one is zero; Yet, with a Cartesian utilization of mathematics, the natural log of one may often tend to be 2PIin. When the eluded potential application of such a case is to occur, small n is to be simply 1. So, depending upon where in the “ equation “ you are looking at, N may be anywhere from 2 to 26; N may be anywhere from 3 to 96; Or, N may be simply 1. In the “knotting equation “ of trinomial eigenstate, N is a single integer per layering, that is anywhere from 3 to 96. In the potential Cartesian case, where there is no viably present Planck Energy, small n is one. Whereas; In the summation (series),that is in the math that I did, N is recursively altered, from equaling one to equaling anywhere from 2 to 26 — depending upon the pertinent magnitude of Stoke’s-Based spatial dimensionality. So: Each centralized knot, (of which is eluded to, with the idea, as to the mentioned implicit trinomial eigenstates), is delineated in a twined configuration, that is anywhere from 3 to 96 spatial dimensional. The Stoke’s -based region itself, per potentially layered region, is comprised, in anywhere, from 2 to 26 spatial dimensions plus time. And the Cartesian implicit idea that I have eluded to earlier, is here to be considered, in a heuristically reductional case, in which small n is 1. I hope that this is clear now! If not, please ask any pertinent questions!
Use the hereupon Grand Unified Field Theory Equation, to determine, with at least some sort of viable expectation value, what the corroborative holonomic substrate of localized covariant space-time-fabric, is to be expressed of as. I just Started to indicate how the eminently corroborative equation in consideration is to be utilized. I will continue with this explanation, a little bit more, in a future encounter. Till next time, Later! SAM ROACH from PINCKNEY MICHIGAN!
Hello. I’m back!
To get back to what I was saying about the attempted grand unified field theory equation:
There are 112 reductional “gamma knot of the field” general tenses to consider — simply for cotangent bundle R(sub N) alone, to consider. Depending upon the eminently associated Stoke’s-Based region, that one may have involved in such an implicit situation, one may often thereby, be potentially put into a situation, in which one is to find a resultant R(sub N), that can be formed, or formulated, by finding an intersection of such reductional fields. The more of a selection of co-deterministic interdependently interactive fields that are to be hereby considered, as being or acting upon the given arbitrary focused upon region, the greater that the expectation value is to consequently tend to be, as to what the determined holonomic substrate is to be tabulated as. Understanding what the holonomic substrate of localized covariant space-time-fabric is to be, for a given arbitrary region in time and space, with a relatively high expectation value, may often work to help facilitate an increased knowledge, as to how such an implicit place in time and space is to behave. One is thereby, to have the viable potential, of any possible combination of the 112 implied "gamma knot of the field" trinomial eigenstate-related templates, when in conjunction with the viable potential, of any possible combination of regions, that may be tantamount to working to involve anywhere from 2 to 26 spatial dimensions plus time, when in conjunction, with the viable potential, of working to consider, any of the shapes and energy-related magnitudes, that may here to eminently corroborative, with the multiplicity of the general multi-considerate Stoke's-Based field of this.
In theory, if one were to consider a very large number of such co-deterministic interdependently interactive fields, one could potentially have a spontaneously immense predicated knowledge, of the viably possible behavior, that one could respectively gander to surmise, within reason, as to a relatively educated guess, as to how the region and its component parts, is relatively likely to act, in such a case.
I will continue with a furthered explanation, LATER!!! (Such as a set of pictures, showing 56 pairs of my 112 reductional "gamma knot of the field" general tendencies, for cotangent bundle R(sub N), when in terms of, here, the trinomial eigenstates, of which are here to be determined, to help to be able to solve, in lieu of the "equation" that I have provided, in, "Enhancement Of The Kahler-Metric," in so as to be able to facilitate the general process, of having the capability, of working to refine a knowledge, as to what the holonomic substrate of localized covariant space-time-fabric is to be, for any Stoke's-Based region in time and space.)
Sincerely, Sam Roach!
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