English

On Sparsely Schemmel Totient Numbers

Number Theory 2014-12-10 v1

Abstract

For each positive integer rr, let SrS_r denote the rthr^{th} Schemmel totient function, a multiplicative arithmetic function defined by Sr(pα)={0,\mboxifpr;pα1(pr),\mboxifp>rS_r(p^{\alpha})=\begin{cases} 0, & \mbox{if } p\leq r; \\ p^{\alpha-1}(p-r), & \mbox{if } p>r \end{cases} for all primes pp and positive integers α\alpha. The function S1S_1 is simply Euler's totient function ϕ\phi. Masser and Shiu have established several fascinating results concerning sparsely totient numbers, positive integers nn satisfying ϕ(n)<ϕ(m)\phi(n)<\phi(m) for all integers m>nm>n. We define a sparsely Schemmel totient number of order rr to be a positive integer nn such that Sr(n)>0S_r(n)>0 and Sr(n)<Sr(m)S_r(n)<S_r(m) for all m>nm>n with Sr(m)>0S_r(m)>0. We then generalize some of the results of Masser and Shiu.

Cite

@article{arxiv.1412.3080,
  title  = {On Sparsely Schemmel Totient Numbers},
  author = {Colin Defant},
  journal= {arXiv preprint arXiv:1412.3080},
  year   = {2014}
}

Comments

14 pages, 0 figures, Supported by National Science Foundation grant no. 1262930

R2 v1 2026-06-22T07:25:36.394Z