TITLE:
The Prime Sequence: Demonstrably Highly Organized While Also Opaque and Incomputable—With Remarks on Riemann’s Hypothesis, Partition, Goldbach’s Conjecture, Euclid on Primes, Euclid’s Fifth Postulate, Wilson’s Theorem along with Lagrange’s Proof of It and Pascal’s Triangle, and Rational Human Intelligence
AUTHORS:
Leo Depuydt
KEYWORDS:
Absolute Limitations of Rational Human Intelligence, Analytic Number Theory, Aristotle’s Fundamental Axiom of Thought, Euclid’s Fifth Postulate, Euclid on Numbers, Euclid on Primes, Euclid’s Proof of the Primes’ Infinitude, Euler’s Infinite Prime Product, Euler’s Infinite Prime Product Equation, Euler’s Product Formula, Gödel’s Incompleteness Theorem, Goldbach’s Conjecture, Lagrange’s Proof of Wilson’s Theorem, Number Theory, Partition, Partition Numbers, Prime Numbers (Primes), Prime Sequence (Sequence of the Prime Numbers), Rational Human Intelligence, Rational Thought and Language, Riemann’s Hypothesis, Riemann’s Zeta Function, Wilson’s Theorem
JOURNAL NAME:
Advances in Pure Mathematics,
Vol.4 No.8,
August
22,
2014
ABSTRACT:
The main design of this paper is to determine once and for all the true
nature and status of the sequence of the prime numbers, or primes—that is, 2,
3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37, 41, 43, and so on. The main conclusion
revolves entirely around two points. First, on the one hand, it is shown that
the prime sequence exhibits an extremely high level of organization. But
second, on the other hand, it is also shown that the clearly detectable
organization of the primes is ultimately beyond human comprehension. This
conclusion runs radically counter and opposite—in regard to both points—to what
may well be the default view held widely, if not universally, in current
theoretical mathematics about the prime sequence, namely the following. First,
on the one hand, the prime sequence is deemed by all appearance to be entirely
random, not organized at all. Second, on the other hand, all hope has not been
abandoned that the sequence may perhaps at some point be grasped by human
cognition, even if no progress at all has been made in this regard. Current mathematical
research seems to be entirely predicated on keeping this hope alive. In the
present paper, it is proposed that there is no reason to hope, as it were.
According to this point of view, theoretical mathematics needs to take a
drastic 180-degree turn. The manner of demonstration that will be used is
direct and empirical. Two key observations are adduced showing, 1), how the
prime sequence is highly organized and, 2), how this organization transcends
human intelligence because it plays out in the dimension of infinity and in
relation to π. The present paper is part of a larger project whose design it is
to present a complete and final mathematical and physical theory of rational
human intelligence. Nothing seems more self-evident than that rational human
intelligence is subject to absolute limitations. The brain is a material and
physically finite tool. Everyone will therefore readily agree that, as far as
reasoning is concerned, there are things that the brain can do and things that
it cannot do. The search is therefore for the line that separates the two, or
the limits beyond which rational human intelligence cannot go. It is proposed
that the structure of the prime sequence lies beyond those limits. The
contemplation of the prime sequence teaches us something deeply fundamental
about the human condition. It is part of the quest to Know Thyself.