Approaching the coupon collector's problem with group drawings via Stein's method

Abstract

In this paper the coupon collector's problem with group drawings is studied. Assume there are n different coupons. At each time precisely s of the n coupons are drawn, where all choices are supposed to have equal probability. The focus lies on the fluctuations, as n∞, of the number Zn,s(kn) of coupons that have not been drawn in the first kn drawings. Using a size-biased coupling construction together with Stein's method for normal approximation, a quantitative central limit theorem for Zn,s(kn) is shown for the case that kn=n s(α(n)+x), where 0<α<1 and x∈R. The same coupling construction is used to retrieve a quantitative Poisson limit theorem in the boundary case α=1, again using Stein's method.