Limiting Behavior of High Order Correlations for Simple Random Sampling

Abstract

For N=1,2,..., let SN be a simple random sample of size n=nN from a population AN of size N, where 0<=n<=N. Then with fN=n/N, the sampling fraction, and 1A the inclusion indicator that A is in SN, for any H a subset of AN of size k>= 0, the high order correlations Corr(k) = E (ΠA ∈ H (1A-fN)) depend only on k, and if the sampling fraction fN -> f as N -> infinity, then Nk/2Corr(k) -> [f(f-1)]k/2EZk, k even and N(k+1)/2Corr(k) -> [f(f-1)](k-1)/2(2f-1)(1/3)(k-1)EZk+1, k odd where Z is a standard normal random variable. This proves a conjecture given in [2].