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Zeta function behaviourLower bounds on zeta(s+it) for fixed s |
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Zeta function behaviourThis is most probably widely known and discussed here many times, so I am preliminay sorry. Does Riemann conjecture imply some lower estimates on values, say $|\zeta(3/4+it)|$ for real $t$, when $|t|$ tends to infinity? Are any such results known without assuming Riemann conjecture (many doubts here)? Thanks!
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