Limit Forms of the Distribution of the Number of Renewals

Abstract

In this work the asymptotic properties of Qt(N) ,the probability of the number of renewals (N), that occur during time t are explored. While the forms of the distribution at very long times, i.e. t∞, are very well known and are related to the Gaussian Central Limit Theorem or the L\'evy stable laws, the alternative limit of large number of renewals, i.e. N∞, is much less noted. We address this limit of large N and find that it attains a universal form that solely depends on the analytic properties of the distribution of renewal times. Explicit formulas for Qt(N) are provided, together with corrections for finite N and the necessary conditions for convergence to the universal asymptotic limit. Our results show that the Large Deviations rate function for N/t exists and attains an universal linear growth (up to logarithmic corrections) in the N/t∞ limit. This result holds irrespective of the existence of mean renewal time or presence of power-law statistics.