English

On the Riemann zeta-function and the divisor problem III

Number Theory 2008-11-06 v3

Abstract

Let Δ(x)\Delta(x) denote the error term in the Dirichlet divisor problem, and E(T)E(T) the error term in the asymptotic formula for the mean square of ζ(1/2+it)|\zeta(1/2+it)|. If E(t)=E(t)2πΔ(t/2π)E^*(t) = E(t) - 2\pi\Delta^*(t/2\pi) with Δ(x)=Δ(x)+2Δ(2x)12Δ(4x)\Delta^*(x) = -\Delta(x) + 2\Delta(2x) - {1\over2}\Delta(4x) and we set 0TE(t)dt=3πT/4+R(T)\int_0^T E^*(t) dt = 3\pi T/4 + R(T), then we obtain R(T)=Oϵ(T593/912+ϵ),0TR4(t)dtϵT3+ϵ, R(T) = O_\epsilon(T^{593/912+\epsilon}), \int_0^TR^4(t) dt \ll_\epsilon T^{3+\epsilon}, and 0TR2(t)dt=T2P3(logT)+Oϵ(T11/6+ϵ), \int_0^TR^2(t) dt = T^2P_3(\log T) + O_\epsilon(T^{11/6+\epsilon}), where P3(y)P_3(y) is a cubic polynomial in yy with positive leading coefficient.

Keywords

Cite

@article{arxiv.math/0610539,
  title  = {On the Riemann zeta-function and the divisor problem III},
  author = {Aleksandar Ivic},
  journal= {arXiv preprint arXiv:math/0610539},
  year   = {2008}
}

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18 pages