The Distribution of the Nontrivial Zeros of Riemann Zeta Function

Abstract

We improve the estimation of the distribution of the nontrivial zeros of Riemann zeta function ζ(σ+it) for sufficiently large t, which is based on an exact calculation of some special logarithmic integrals of nonvanishing ζ(σ+it) along well-chosen contours. A special and single-valued coordinate transformation s=τ(z) is chosen as the inverse of z=(s), and the functional equation ζ(s) = (s)ζ(1-s) is simplified as G(z) = z\, G-(1z) in the z coordinate, where G(z)=ζ(s)=ζτ(z) and G- is the conjugated branch of G. Two types of special and symmetric contours ∂ Dε1 and ∂ Dε2 in the s coordinate are specified, and improper logarithmic integrals of nonvanishing ζ(s) along ∂ Dε1 and ∂ Dε2 can be calculated as 2π i and 0 respectively, depending on the total increase in the argument of z=(s). Any domains in the critical strip for sufficiently large t can be covered by the domains Dε1 or Dε2, and the distribution of nontrivial zeros of ζ(s) is revealed in the end, which is more subtle than Riemann's initial hypothesis and in rhythm with the argument of (12+it).