FINAL THEORY
Towards the formulation of a final theory, and towards the discovery of a type of final equation or equations that such a theory would be based upon, it might be instructive to examine the infinite family of nth-order polynomials, f(x) = 0, which have for their roots the corresponding dimensionless Eddington constants. One might be able to employ Newton’s method in some algorithmic process to numerically search for and identify such polynomials. Further, in addition to the roots of such polynomial-final-theory functions corresponding to the dimensionless Eddington constants, one could place a constraint on the value of the coefficients of such characteristic polynomials by setting them equal to, or proportional to, the values of the natural constants of the physics of nature. Identification of these types of polynomial functions may lead to a better foundational view of the structure of the universe, and certain of these polynomials may lead to further insights about the natural constants and the dimensionless constants of Eddington that are derived from them.
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