On an Old Question of Erdos and R\'enyi Arising in the Delay Analysis of Broadcast Channels

Abstract

Consider a broadcast channel with n users, where different users receive different messages, and suppose that each user has to receive m packets. A quantity of interest here, introduced by Sharif and Hassibi (2006-7) Sh, S-H, is the (packet) delay Dm,n, namely the number of channel uses required to guarantee that all users will receive m packets. For the case of a homogeneous network, where in each channel use the transmitter chooses a user at random, i.e. with probability 1/n, and sends him/her a packet, the same quantity Dm,n had already appeared in the coupon collector context, in the works of Newman and Shepp (1960) N-S and of Erdos and R\'enyi (1961) E-R. A problem of particular interest in wireless communications, related to the delay Dm,n, is to determine its behavior as n and m grow large. Regarding this problem, Sharif and Hassibi Sh, S-H managed to calculated the asymptotics of the mean value E[Dm,n], as n ∞, for the cases (a) m = n and (b) m = ( n), > 1. It is remarkable that Erdos and R\'enyi E-R had, also, raised the question of the determination of the asymptotic profile of Dm,n for large m and n (in 1961). And in the 1970's the limiting distribution of Dm,n for large m and n was determined (in great generality) by Ivchenko I1 and I2. In this article we determine the asymptotics of the moments of Dm,n for large m and n. We also derive its limiting distribution in the "supercritical case" where m grows faster than n and in the "critical case" m β n, by an approach which is different from the one used by Ivchenko.