On the minimum of independent collecting processes via the Stirling numbers of the second kind

Abstract

We consider the combinatorial problem where p players aim to a complete set of N different types of items (species) which are uniformly distributed. Let the random variables TN(i),\,\,i=1,2,·s,p denoting the number of trials needed until all N types are detected (at least once), respectively for each player. This paper studies the impact of the number p in the asymptotics of the expectation, the second moment, and the variance of the random variable equation* MN(p): = i=1p TN(i),\,\,\,\,\,\,N→ ∞. equation* The main ingredient in the expression of these quantittes are sums involving the Stirling numbers of the second kind; for which the asymptotics are explored. At the end of the paper we conjecture on a remarkable combinatorial identity, regarding alternating binomial sums. These sums have been studied (mainly) by P. Flajolet due to their applications to digital search trees and quadtrees.