Definitive graphic proof of the Riemann hypothesis.
The funicolar polygons produced by the zeta(s) function, provide proof that the Riemann hypothesis is true.
The proof is provided by the particular spirals that make up the second half of the funicular polygons produced by the Riemann zeta (s) function.
I have called these spirals "pseudo-clothoid".
Regardless of the value of the imaginary part of (s) and only if the real part of (s) is 1/2, the "pseudo-clothoids" retrace the path traced by the individual vectors in the first half of the funicular polygon in a mirror image and in the opposite direction.
More information can be found in two of my articles, this is the link of the last one http://doi.org/10.5281/zenodo.7015290