Extremality and Limit Laws for the Siblings of the Coupon Collector

Abstract

We study the siblings version of the coupon collector problem. A main collector stops when every coupon type has appeared at least once, duplicates are passed successively to later siblings, and UjN denotes the number of empty spaces in collector j's album at the main completion time. We prove three results. First, for every fixed N and j2, UjN is uniquely maximized over positive coupon distributions by the uniform distribution; in fact it decreases strictly along every nonconstant ray from the uniform vector. Second, in the uniform model, UjN is stochastically increasing in N, and we construct an increasing coupling using top spacings of exponential order statistics. Third, for fixed album indices 2,…,J, the naturally normalized vector converges jointly to (W,…,W), where W is exponential with mean one. We also derive exact Poissonized and alternating-subset formulae and give a transfer principle for leading expectation asymptotics.