CONVOLUTIONS AND MEAN SQUARE ESTIMATES OF CERTAIN NUMBER-THEORETIC ERROR TERMS

Aleksandar Ivic

Abstract: We study the convolution function $$ C[f(x)]:=\int_1^x f(y)f\Bigl(\frac xy\Bigr)\frac{dy}y $$ when $f(x)$ is a suitable number-theoretic error term. Asymptotics and upper bounds for $C[f(x)]$ are derived from mean square bounds for $f(x)$. Some applications are given, in particular to $|\zeta(\tfrac12+ix)|^{2k}$ and the classical Rankin–Selberg problem from analytic number theory.

Keywords: Convolution functions, slowly varying functions, the Riemann zeta-function, Dirichlet divisor problem, Abelian groups of a given order, the Rankin–Selberg problem

Classification (MSC2000): 11N37, 11M06, 44A15, 26A12

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