Dickman polylogarithms and their constants

Abstract

The Dickman function F(alpha) gives the asymptotic probability that a large integer N has no prime divisor exceeding Nalpha. It is given by a finite sum of generalized polylogarithms defined by the exquisite recursion Lk(alpha)=- intalpha1/k dx Lk-1(x/(1-x))/x with L0(alpha)=1. The behaviour of these Dickman polylogarithms as alpha tends to 0 defines an intriguing series of constants, Ck. I conjecture that exp(gamma z)/Gamma(1-z) is the generating function for sumk0 Ck zk. I obtain high-precision evaluations of F(1/k), for integers k<11, and compare the Dickman problem with problems in condensed matter physics and quantum field theory.