Part III. of III. Set-Theoretical Roots of the Seldonian Algebraic Dialectical Logic.
III: A Finitary Set-Of-All-Objects Dialectical [Meta-]Model for the [Meta-]Monad-ic [Meta-]Evolution of the Known Universe as a Whole.
One of the several pathways that led Karl Seldon to his discovery of what we now term the ‘F.E.D. First Algebra for Dialectical Logic’, was his immanent critique of modern set theory, centering upon the very center of modern set theory, the set-theoretical definition of the set concept itself, namely, ‘the [finitary] set of all sets’.
The text below, written by an anonymous member of the F.E.D. research collective, constitutes the third part of a planned three-part introduction to the set-theory-critique path to the Seldonian ‘Mathematics of Dialectic’ entire.
This third part constructs a finitary set-of-all-objects dialectical-categorial [meta-]model of the [meta-]monad-ic [meta-]evolution, i.e., of the ‘recurring ontological self-revolutionization’, of the Known Universe as a Whole.