A new representation of the meromorphic symmetrical form of the zeta function enables a characterization of its zeros as an identity of two alternating power series representations. If a negative value of the square of the imaginary part of those zeros exists, the affected term of the first alternating series changes its sign, whereas the corresponding term on the second alternating series does not. This proves the RH.


                      

Braun K., A proof of the Riemann Hypothesis.pdf

      

Braun K., A toolbox to build a non-harmonic Fourier series based two-semicircle method.pdf

  

                            

Edwards H. M., Riemann s Zeta Function

 

Milgram, M.S., Integral and series representations of Riemann′s Zeta function and Dirichlet′s Eta function and a medley of related results.pdf