Sampling from a mixture of different groups of coupons

Abstract

A collector samples coupons with replacement from a pool containing g uniform groups of coupons, where "uniform group" means that all coupons in the group are equally likely to occur. For each j = 1, …, g let Tj be the number of trials needed to detect Group j, namely to collect all Mj coupons belonging to it at least once. We derive an explicit formula for the probability that the l-th group is the first one to be detected (symbolically, P\Tl = j=1g Tj\). We also compute the asymptotics of this probability in the case g=2 as the number of coupons grows to infinity in a certain manner. Then, in the case of two groups we focus on T := T1 T2, i.e. the number of trials needed to collect all coupons of the pool (at least once). We determine the asymptotics of E[T] and V[T], as well as the limiting distribution of T (appropriately normalized) as the number of coupons becomes very large.