Aliquot sum

Template:Short description

In number theory, the aliquot sum Template:Math of a positive integer Template:Mvar is the sum of all proper divisors of Template:Mvar, that is, all divisors of Template:Mvar other than Template:Mvar itself. That is, $${\displaystyle s(n)=\sum _{\genfrac{}{}{0ex}{}{d|n,}{d\ne n}}d.}$$

It can be used to characterize the prime numbers, perfect numbers, sociable numbers, deficient numbers, abundant numbers, and untouchable numbers, and to define the aliquot sequence of a number.

For example, the proper divisors of 12 (that is, the positive divisors of 12 that are not equal to 12) are Template:Nowrap, and 6, so the aliquot sum of 12 is 16 i.e. (Template:Nowrap).

The values of Template:Math for Template:Nowrap are:

0, 1, 1, 3, 1, 6, 1, 7, 4, 8, 1, 16, 1, 10, 9, 15, 1, 21, 1, 22, 11, 14, 1, 36, 6, 16, 13, 28, 1, 42, 1, 31, 15, 20, 13, 55, 1, 22, 17, 50, 1, 54, 1, 40, 33, 26, 1, 76, 8, 43, ... Template:OEIS

The aliquot sum function can be used to characterize several notable classes of numbers:

• 1 is the only number whose aliquot sum is 0.
• A number is prime if and only if its aliquot sum is 1.Template:R
• The aliquot sums of perfect, deficient, and abundant numbers are equal to, less than, and greater than the number itself respectively.Template:R The quasiperfect numbers (if such numbers exist) are the numbers Template:Mvar whose aliquot sums equal Template:Math. The almost perfect numbers (which include the powers of 2, being the only known such numbers so far) are the numbers Template:Mvar whose aliquot sums equal Template:Math.
• The untouchable numbers are the numbers that are not the aliquot sum of any other number. Their study goes back at least to Abu Mansur al-Baghdadi (circa 1000 AD), who observed that both 2 and 5 are untouchable.Template:R Paul Erdős proved that their number is infinite.Template:R The conjecture that 5 is the only odd untouchable number remains unproven, but would follow from a form of Goldbach's conjecture together with the observation that, for a semiprime number Template:Mvar, the aliquot sum is Template:Math.Template:R

The mathematicians Template:Harvtxt noted that one of Erdős' "favorite subjects of investigation" was the aliquot sum function.

Template:Main Iterating the aliquot sum function produces the aliquot sequence Template:Math of a nonnegative integer Template:Mvar (in this sequence, we define Template:Math).

Sociable numbers are numbers whose aliquot sequence is a periodic sequence. Amicable numbers are sociable numbers whose aliquot sequence has period 2.

It remains unknown whether these sequences always end with a prime number, a perfect number, or a periodic sequence of sociable numbers.^[1]

• Sum of positive divisors function, the sum of the (Template:Mvarth powers of the) positive divisors of a number
• William of Auberive, medieval numerologist interested in aliquot sums

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• Template:MathWorld