Product of uniform distribution and Stirling numbers of the first kind

Let V-k = mu(1)mu(2)center dot center dot center dot mu(k), u(i)'s be i.i.d similar to U(0, 1), the p.d.f of 1 - Vk+1 be the GF of the unsigned Stirling numbers of the first kind s(n, k). This paper discusses the applications of uniform distribution to combinatorial. analysis and Riemann zeta function; several identities of Stirling series are established, and the Euler's result for Sigma H-n/n(k-1), k >= 3 is given a new probabilistic proof.