indeterminacy
Indeterminacy refers to the problem of the number of points in the universe: specifically the counting of them.
These points are indeterminable through game theory (polynominalism) because game theory has uncountable number of pieces--graphices.
These points are indeterminable through game theory (polynominalism) because game theory has uncountable number of pieces--graphices.
The problem of indeterminacy can be solved by applying the Tarski to Godel which notes that the number of points in the universe is infinite and this problem can only be solved by a human...
The human mind--only--can solve the number of points in the universe because the human mind happens to sum the number of points in its structure to be infinity plus uncountability = infinity. Human mind can treat the adddenum of uncountability as trivial because a non-Tarski-space has the uncountable set in its INTERIOR wall. The sum of game theory elements CANNOT treat the addendum of uncountability as trivial because it is a deterministic line (subject to Tarski rules)...
Indeterminacy cannot be solved by game theory because a paradigm with an uncountable number of parts is irreducibly complex.
The human mind--only--can solve the number of points in the universe because the human mind happens to sum the number of points in its structure to be infinity plus uncountability = infinity. Human mind can treat the adddenum of uncountability as trivial because a non-Tarski-space has the uncountable set in its INTERIOR wall. The sum of game theory elements CANNOT treat the addendum of uncountability as trivial because it is a deterministic line (subject to Tarski rules)...
Indeterminacy cannot be solved by game theory because a paradigm with an uncountable number of parts is irreducibly complex.
problem of indeterminacy
The indeterminacy problem in computer science is a statement that a polynomial time-wave is equal to a NON-polynomial time-wave under a hypothetical circumstance.
The problem of indeterminacy states that the draw-distance of a transfinite surface is equivalent to the surface area of a next-adjacent complex number.
A solution to the Riemann Hypothesis states that this is indeed the case.
A solution to the Riemann Hypothesis states that this is indeed the case.