An estimate for the Mellin transform of powers of Hardy's function.

Mapping Intimacies ◽

10.46298/hrj.2010.169 ◽

2010 ◽

Vol Volume 33 ◽

Author(s):

Matti Jutila

Keyword(s):

Entire Function ◽

Zeta Function ◽

Mellin Transform ◽

Critical Line ◽

Classical Estimate ◽

International Audience ◽

Hardy’S Function

International audience We show that a certain modified Mellin transform $\mathcal M(s)$ of Hardy's function is an entire function. There are reasons to connect $\mathcal M(s)$ with the function $\zeta(2s-1/2)$, and then the orders of $\mathcal M(s)$ and $\zeta(s)$ should be comparable on the critical line. Indeed, an estimate for $\mathcal M(s)$ is proved which in the particular case of the critical line coincides with the classical estimate of the zeta-function.

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On the Mellin transforms of powers of Hardy's function.

10.46298/hrj.2010.170 ◽

2010 ◽

Vol Volume 33 ◽

Author(s):

Aleksandar Ivić

Keyword(s):

Mellin Transform ◽

Mellin Transforms ◽

International Audience ◽

Power Moments ◽

Hardy’S Function ◽

Natural Boundaries

International audience Various properties of the Mellin transform function $$\mathcal{M}_k(s):= \int_1^{\infty} Z^k(x)x^{-s}\,dx$$ are investigated, where $$Z(t):=\zeta(\frac{1}{2}+it)\,\chi(\frac{1}{2}+it)^{-1/2},~~~~\zeta(s)=\chi(s)\zeta(1-s)$$ is Hardy's function. Connections with power moments of $|\zeta(\frac{1}{2}+it)|$ are established, and natural boundaries of $\mathcal{M}_k(s)$ are discussed.

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Hybrid Moments of the Riemann Zeta-Function

Journal of Numbers ◽

10.1155/2015/892324 ◽

2015 ◽

Vol 2015 ◽

pp. 1-14

Author(s):

Aleksandar Ivić

Keyword(s):

Zeta Function ◽

Riemann Zeta Function ◽

Upper Bound ◽

Mellin Transform ◽

Critical Line ◽

Mean Square ◽

The Riemann Zeta Function ◽

Riemann Zeta

The “hybrid” moments ∫T2Tζ1/2+itk∫t-Gt+Gζ1/2+ixldxmdt Tε≪G=GT≪T of the Riemann zeta-function ζs on the critical line Res=1/2 are studied. The expected upper bound for the above expression is Oε(T1+εGm). This is shown to be true for certain specific values of k,l,m∈N, and the explicitly determined range of G=G(T;k,l,m). The application to a mean square bound for the Mellin transform function of ζ1/2+ix4 is given.

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The mellin transform of Hardy’s function is entire

Mathematical Notes ◽

10.1134/s0001434610090348 ◽

2010 ◽

Vol 88 (3-4) ◽

pp. 612-616

Author(s):

M. Jutila

Keyword(s):

Mellin Transform ◽

Hardy’S Function

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On the Application of the Plan Formula to the Study of the Zeta-Function of Zeros of Entire Function

Journal of Siberian Federal University Mathematics & Physics ◽

10.17516/1997-1397-2020-13-2-135-140 ◽

2020 ◽

pp. 135-140

Author(s):

Vyacheslav I. Kuzovatov ◽

Alexander M. Kytmanov ◽

Azimbai Sadullaev

Keyword(s):

Entire Function ◽

Integral Representation ◽

Zeta Function ◽

Explicit Expression

We consider an application of the Plan formula to the study of the properties of the zeta- function of zeros of entire function. Based on this formula, we obtained an explicit expression for the kernel of the integral representation of the zeta-function in this case

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