The problem here is that conventional mathematics uses a flawed (i.e., partially anti-symmetric [i.e., one divided by infinity is equal to zero and one divided by zero is undefined]) numerical system. The Riemann hypothesis should be provable when using Earths numerical system with the systems zero approached from the positive direction (which is of greater magnitude than its positive infinity) in the place of the traditional infinity of the conventional Riemann zeta function.
Quote from: Earths set of all real numbers
Code:
ℝ = {*0⁺,
, −*1,
, −1,
, 0⁻, 0⁺,
, 1,
, *1,
, *0⁻}