Mod-discrete expansions

Abstract

In this paper, we consider approximating expansions for the distribution of integer valued random variables, in circumstances in which convergence in law cannot be expected. The setting is one in which the simplest approximation to the n'th random variable Xn is by a particular member Rn of a given family of distributions, whose variance increases with n. The basic assumption is that the ratio of the characteristic function of Xn and that of Rn$ converges to a limit in a prescribed fashion. Our results cover a number of classical examples in probability theory, combinatorics and number theory.