Ken Roberts wrote:
Is there something missing in your question?
Did you mean something like this?
Consider the y values which appear as imaginary parts of zeta function zeros. Is that set of y values, modulo 2*pi, dense in [0,2*pi] ?
No, there is nothnig missing: my question conerned conjecture which means maximal violation of the Riemann Hypothesis. In connection with your remark I notice that in Journal für die reine und angewandte Mathematik 254, 100–109 (1972) (Theorem 2) P.D.T.A. Elliott assuming RH proved that the sequence \alpha\gamm_n (n = 1, 2, ...), where \gamma_n is the n-th imaginary part of nontrivial zero on the critical line, is uniformly distributed modulo 1 for every real nonzero \alpha. Marek Wolf