Abundancy "Outlaws" of the Form (sigma(N) + t)/N

Journal of Integer Sequences, Vol. 10 (2007), Article 07.9.6

Abundancy "Outlaws" of the Form (σ(N) + t)/N

William G. Stanton and Judy A. Holdener
Department of Mathematics
Kenyon College
Gambier, Ohio 43022
USA

Abstract:

The abundancy index of a positive integer

is defined to be the rational number $I(n)=\sigma(n)/n$ , where $\sigma$ is the sum of divisors function $\sigma(n)=\sum_{d\vert n}d$ . An abundancy outlaw is a rational number greater than 1 that fails to be in the image of of the map

. In this paper, we consider rational numbers of the form $(\sigma(N)+t)/N$ and prove that under certain conditions such rationals are abundancy outlaws.

Full version: pdf, dvi, ps, latex

Received October 25 2006; revised version received August 31 2007; September 25 2007. Published in Journal of Integer Sequences, September 25 2007.

Return to Journal of Integer Sequences home page

Abundancy "Outlaws" of the Form (σ(N) + t)/N

William G. Stanton and Judy A. Holdener Department of Mathematics Kenyon College Gambier, Ohio 43022 USA

William G. Stanton and Judy A. Holdener
Department of Mathematics
Kenyon College
Gambier, Ohio 43022
USA