%0 Journal Article
%T Measure Theoretic Aspects of Oscillations of Error Terms
%A Kamalakshya Mahatab
%A Anirban Mukhopadhyay
%J Mathematics
%D 2015
%I arXiv
%X In this paper we obtain $\Omega$ and $\Omega_\pm$ estimates for a wide class of error terms $\Delta(x)$ appearing in Perron summation formula. We revisit some classical $\Omega$ and $\Omega_{\pm}$ bounds on $\Delta(x)$, and obtain $\Omega$ bounds for Lebesgue measure of the following types of sets: \begin{align*} \A_+&:=\{T\leq x \leq 2T: \Delta(x)> \lambda x^{\alpha}\},\\ \A_-&:=\{T\leq x \leq 2T: \Delta(x)< -\lambda x^{\alpha}\},\\ \A~&:=\{T\leq x \leq 2T: |\Delta(x)|>\lambda x^{\alpha}\}, \end{align*} where $\alpha, \lambda>0$. We also prove that if Lebesgue measure of $\A$ is $\Omega(T^{1-\delta})$ then \[\Delta(x)=\Omega_\pm(x^{\alpha-\delta})\] for any $0<\delta<\alpha$.
%U http://arxiv.org/abs/1512.03144v1