论文信息 - Limit Theorems for Some Occupancy and Sequential Occupancy Problems

Limit Theorems for Some Occupancy and Sequential Occupancy Problems

Consider a situation in which balls are falling into N cells with arbitrary probabilities. A limiting distribution for the number of occupied cells after n falls is obtained, when n and N -+ oo, so that n2/N -+ oo and n/N -+ 0. This result completes some theorems given by Chistyakov (1964), (1967). Limiting distributions of the number of falls to achieve aN+ 1 occupied cells are obtained when lim sup aN/N < 1. These theorems generalize theorems given by Baum and Billingsley (1965), and David and Barton (1962), when the balls fall into cells with the same probability for every cell.

Lars Holst | L. Holst

[1] Lars Holst,et al. Asymptotic normality in a generalized occupancy problem , 1972 .

[2] Patrick Billingsley,et al. Asymptotic Distributions for the Coupon Collector's Problem , 1965 .

[3] V. P. Chistyakov. On the Calculation of the Power of the Test of Empty Boxes , 1964 .

[4] B. Rosén,et al. Asymptotic normality in a coupon collector's problem , 1969 .

[5] L. Holst. A note on finding the size of a finite population , 1971 .

[6] Bengt Rosen. On the Coupon Collector's Waiting Time , 1970 .