Mertens' prime product formula, dissected

Abstract

In 1874, Mertens famously proved an asymptotic formula for the product p/(p-1) over all primes p up to x. On the other hand, one may expand Mertens' prime product into series over numbers n with only small prime factors. It is natural to restrict such series to numbers n with a fixed number k of prime factors. In this article, we obtain formulae for these series for each k, which together dissect Mertens' original estimate. The proof is by elementary methods of a combinatorial flavor.