Definition:Sociable Chain

Definition
Let $m$ be a positive integer.

Let $s \left({m}\right)$ be the aliquot sum of $m$.

Define the sequence $\left\langle{a_k}\right\rangle$ recursively as:
 * $a_{k + 1} = \begin{cases} m & : k = 0 \\ s \left({a_k}\right) & : k > 0 \end{cases}$

A sociable chain is such a sequence $\left\langle{a_k}\right\rangle$ where:
 * $a_r = a_0$

for some $r > 0$.

Also known as
A sociable chain is known in some sources as a sociable cycle.

Beware of the temptation to refer to it as a social chain -- this term is not used in mathematics.

The elements of a sociable chain of order $2$ are generally known as amicable numbers