Sum-of-divisors function: Difference between revisions

From Citizendium
Jump to navigation Jump to search
imported>Daniel Mietchen
(+subpages)
imported>Meg Taylor
No edit summary
Line 1: Line 1:
{{subpages}}
{{subpages}}
In [[number theory]] the '''sum-of-divisors function''' of a positive integer, denoted σ(''n''), is the sum of all the positive [[divisor]]s of the number ''n''.
In [[number theory]] the '''sum-of-divisors function''' of a positive integer, denoted σ(''n''), is the sum of all the positive [[divisor]]s of the number ''n''.


It is a [[multiplicative function]], that is is ''m'' and ''n'' are coprime then <math>\sigma(mn) = \sigma(m)\sigma(n)</math>.   
It is a [[multiplicative function]], that is ''m'' and ''n'' are coprime then <math>\sigma(mn) = \sigma(m)\sigma(n)</math>.   


The value of σ on a general integer ''n'' with prime factorisation
The value of σ on a general integer ''n'' with prime factorisation

Revision as of 03:53, 1 November 2013

This article is a stub and thus not approved.
Main Article
Discussion
Related Articles  [?]
Bibliography  [?]
External Links  [?]
Citable Version  [?]
 
This editable Main Article is under development and subject to a disclaimer.

In number theory the sum-of-divisors function of a positive integer, denoted σ(n), is the sum of all the positive divisors of the number n.

It is a multiplicative function, that is m and n are coprime then .

The value of σ on a general integer n with prime factorisation

is then

The average order of σ(n) is .

A perfect number is defined as one equal to the sum of its "aliquot divisors", that is all divisors except the number itself. Hence a number n is perfect if σ(n) = 2n. A number is similarly defined to be abundant if σ(n) > 2n and deficient if σ(n) < 2n. A pair of numbers m, n are amicable if σ(m) = m+n = σ(n): the smallest such pair is 220 and 284.