Behrend sequence

If ${\displaystyle A}$ is a sequence of integers greater than one, and if ${\displaystyle M(A)}$ denotes the set of positive integer multiples of members of ${\displaystyle A}$, then ${\displaystyle A}$ is a Behrend sequence if ${\displaystyle M(A)}$ has natural density one. This means that the proportion of the integers from 1 to ${\displaystyle n}$ that belong to ${\displaystyle M(A)}$ converges, in the limit of large ${\displaystyle n}$, to one.

The prime numbers form a Behrend sequence, because every integer greater than one is a multiple of a prime number. More generally, a subsequence ${\displaystyle A}$ of the prime numbers forms a Behrend sequence if and only if the sum of reciprocals of ${\displaystyle A}$ diverges.^[1]

The semiprimes, the products of two prime numbers, also form a Behrend sequence. The only integers that are not multiples of a semiprime are the prime powers. But as the prime powers have density zero, their complement, the multiples of the semiprimes, have density one.^[1]