A Theory to Refute the Riemann Hypothesis

This paper introduces a new theory regarding the distribution of the zeros of the Riemann zeta function on the critical line, challenging the current assumptions about the structure of the zeta function. The classical approach, which incorporates both prime and non-prime numbers into the calculations, obscures the actual zeros and results in computations that approach but never reach the true zeros. By isolating the prime numbers, it becomes apparent that the imaginary part of the zeros on the critical line is directly correlated with the primes. The higher the prime, the greater the distance between the zeros. This discovery reveals a pattern that contradicts previous assumptions about the distribution of the zeros in the zeta function.