A divisor generating q-series and cumulants arising from random graphs

Abstract

Uchimura, in 1987, introduced a probability generating function for a random variable X and using properties of this function he discovered an interesting q-series identity. He further showed that the m-th cumulant with respect to the random variable X is nothing but the generating function for the generalized divisor function σm-1(n). Simon, Crippa, and Collenberg, in 1993, explored the Gn,p-model of a random acyclic digraph and defined a random variable γn*(1). Quite interestingly, they found links between limit of its mean and the generating function for the divisor function d(n). Later in 1997, Andrews, Crippa and Simon extended these results using q-series techniques. They calculated limit of the mean and variance of the random variable γn*(1) which correspond to the first and second cumulants. In this paper, we generalize the result of Andrews, Crippa and Simon by calculating limit of the t-th cumulant in terms of the generalized divisor function. Furthermore, we also discover limit forms for identities of Uchimura and Dilcher. This provides a fourth side to the Uchimura-Ramanujan-divisor type three way partition identities expounded by the first four authors recently.