A discrete mean value of the Riemann zeta function
Abstract
In this work, we estimate the sum align* Σ0 < () ≤ T ζ(+α)X() Y(1\!-\! ) align* over the nontirival zeros of the Riemann zeta funtion where α is a complex number with α 1/ T and X(·) and Y(·) are some Dirichlet polynomials. Moreover, we estimate the discrete mean value above for higher derivatives where ζ(+α) is replaced by ζ(m)() for all m∈N. The formulae we obtain generalize a number of previous results in the literature. As an application, assuming the Riemann Hypothesis we obtain the lower bound align* Σ0 < () < T | ζ(m)()|2k T( T)k2+2km+1 (k,m∈N) align* which was previously known under the Generalized Riemann Hypothesis, in the case m=1.
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