Superabundant number

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1. Template:Lb A positive integer whose abundancy index is greater than that of any lesser positive integer.
   • 1984, Richard K. Guy (editor), Reviews in Number Theory 1973-83, Volume 4, Part 1, As printed in Mathematical Reviews, Template:W, page 173,

     The authors prove a theorem: If ${\displaystyle Q(X)}$ is the number of superabundant numbers ${\displaystyle \leqq X}$, then for ${\displaystyle c<5/48,Q(X)\geqq (\log X{)}^{1+c}}$ for sufficiently large ${\displaystyle X}$.

   • 1995, József Sándor, Dragoslav S. Mitrinović, Borislav Crstici, Handbook of Number Theory I, Springer, page 111,

     1) A number ${\displaystyle n}$ is called superabundant if ${\displaystyle \frac{\sigma (n)}{n}>\frac{\sigma (m)}{m}}$ for all ${\displaystyle m}$ with ${\displaystyle 1\le m<n}$. Let ${\displaystyle Q(x)}$ be the counting function of superabundant numbers. Then:

     a) If ${\displaystyle n}$ and ${\displaystyle n^{\prime }}$ are two consecutive superabundant numbers then

     ${\displaystyle \frac{n}{n^{\prime }}<1+c(\log \log n{)}^2/\log n}$

     Corollary. ${\displaystyle Q(x)\ge c\log x\log \log x/(\log \log \log x{)}^2}$.

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• In mathematical terms, a positive integer ${\displaystyle n}$ is a superabundant number if ${\displaystyle \frac{\sigma (m)}{m}<\frac{\sigma (n)}{n}}$ for all positive integers ${\displaystyle m<n}$ (where ${\displaystyle \sigma (n)}$ denotes the sum of the divisors of ${\displaystyle n}$).

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