Marek Wolf
Published 2010-02-22, updated 2010-02-28Version 2
We have used the first 2600 nontrivial zeros gamma_l of the Riemann zeta function calculated with 1000 digits accuracy and developed them into the continued fractions. We calculated the geometrical means of the denominators of these continued fractions and for all cases we get values close to the Khinchin's constant, what suggests that gamma_l are irrational. Next we have calculated the n-th square roots of the denominators q_n of the convergents of the continued fractions obtaining values close to the Khinchin-Levy constant, again supporting the common believe that gamma_l are irrational.
Comments: Some improvements added and misprints corrected. The red lines in Fig.1 and Fig.3 does not hide the circles. Added Fig. 6 and some references
Two arguments that the nontrivial zeros of the Riemann zeta function are irrational. II
At least two of $ζ(5),ζ(7),\ldots,ζ(35)$ are irrational
The Riemann Hypothesis: A Qualitative Characterization of the Nontrivial Zeros of the Riemann Zeta Function Using Polylogarithms
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