THE CYCLE STRUCTURE OF RANDOM PERMUTATIONS
成果类型:
Article
署名作者:
ARRATIA, R; TAVARE, S
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/aop/1176989707
发表日期:
1992
页码:
1567-1591
关键词:
CENTRAL-LIMIT-THEOREM
Random mappings
摘要:
The total variation distance between the process which counts cycles of size 1, 2,...,b of a random permutation of n objects and a process (Z1, Z2..... Z(b)) of independent Poisson random variables with EZ(i) = 1/i converges to 0 if and only if b/n --> 0. This Poisson approximation can be used to give simple proofs of limit theorems and bounds for a wide variety of functionals of random permutations. These limit theorems include the Erdos-Turin theorem for the asymptotic normality of the log of the order of a random permutation, and the DeLaurentis-Pittel functional central limit theorem for the cycle sizes. We give a simple explicit upper bound on the total variation distance to show that this distance decays to zero superexponentially fast as a function of n/b --> infinity. A similar result holds for derangements and, more generally, for permutations conditioned to have given numbers of cycles of various sizes. Comparison results are included to show that in approximating the cycle structure by an independent Poisson process the main discrepancy arises from independence rather than from Poisson marginals.