🏅 Top traders

Proof of reimann hypothesis.

Statement

The riemann hypothesis is the claim the real part of the S term in the zeta function has a real part of 1/2 for all zeroes.

Assumptions

A. If an infinite summation contains irrational terms, the terms which cancel these out must be irrational.

B. The square root of a prime is irrational and this is the only root that produces irrational numbers for all primes.

C. The zeta function is a infinite sum of the form 1/n^s, with the n^s term canceling out to a convergent series for values of S that sum the equation to zero.

D. N in (c) can be prime.

Logic

1. By (c), the n^s terms must sum to zero.

2. By (a) and (1), (1) must cancel out to zero in the summation.

3. By (2) and (a), the term in (1) must have irrational values.

4. By (3) and (D), n must be made irrational by s.

5. By (4) and (B), s must be to the 1/2 power or a square root.

6. By (5), S must contain a 1/2 in addition to other terms.

7. By the problem statement, this satisfies the Riemann hypothesis.

QED