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Another estimating the absolute value of Mertens function

General Mathematics 2020-10-28 v1

Abstract

Through an inversion approach, we suggest a possible estimation for the absolute value of Mertens function M(x)\vert M(x) \vert that M(x)[1πε(x+ε)]x \left\vert M(x) \right\vert \sim \left[\frac{1}{\pi \sqrt{\varepsilon}(x+\varepsilon)}\right]\sqrt{x} (where xx is an appropriately large real number, and ε\varepsilon (0<ε<10<\varepsilon<1) is a small real number which makes 2x+ε2x+\varepsilon to be an integer). For any large xx, we can always find an ε\varepsilon, so that M(x)<[1πε(x+ε)]x\vert M(x) \vert < \left[\frac{1}{\pi \sqrt{\varepsilon}(x+\varepsilon)}\right]\sqrt{x}.

Keywords

Cite

@article{arxiv.2010.14232,
  title  = {Another estimating the absolute value of Mertens function},
  author = {Rong Qiang Wei},
  journal= {arXiv preprint arXiv:2010.14232},
  year   = {2020}
}

Comments

11 pages, no figures

R2 v1 2026-06-23T19:41:02.230Z