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Arithmetic properties of the Ramanujan function

Number Theory 2007-05-23 v1

Abstract

We study some arithmetic properties of the Ramanujan function τ(n)\tau(n), such as the largest prime divisor P(τ(n))P(\tau(n)) and the number of distinct prime divisors ω(τ(n))\omega(\tau(n)) of τ(n)\tau(n) for various sequences of nn. In particular, we show that \hbox{P(τ(n))(logn)33/31+o(1)P(\tau(n)) \geq (\log n)^{33/31 + o(1)}} for infinitely many nn, and \begin{equation*} P(\tau(p)\tau(p^2)\tau(p^3)) > (1+o(1))\frac{\log\log p\log\log\log p} {\log\log\log\log p} \end{equation*} for every prime pp with \hbox{τ(p)0\tau(p)\neq 0}.

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Cite

@article{arxiv.math/0607591,
  title  = {Arithmetic properties of the Ramanujan function},
  author = {Florian Luca and Igor E Shparlinski},
  journal= {arXiv preprint arXiv:math/0607591},
  year   = {2007}
}

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8 pages