Aleksandar Ivić
Published 2017-06-26Version 1
We investigate bounds for the multiplicities $m(\beta+i\gamma)$, where $\beta+i\gamma\,$ ($\beta\ge \1/2, \gamma>0)$ denotes complex zeros of $\zeta(s)$. It is seen that the problem can be reduced to the estimation of the integrals of the zeta-function over "very short" intervals. A new, explicit bound for $m(\beta+i\gamma)$ is also derived, which is relevant when $\beta$ is close to unity. The related Karatsuba conjectures are also discussed.
Upper and lower bounds for the function S(t) on the short intervals
On sums of integrals of powers of the zeta-function in short intervals
Sums of squares of $|ζ(1/2+it)|$ over short intervals
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