Randomized Empirical Processes and Confidence Bands via Virtual Resampling

Abstract

Let X,X1,X2,·s be independent real valued random variables with a common distribution function F, and consider \X1,·s,XN \, possibly a big concrete data set, or an imaginary random sample of size N≥ 1 on X. In the latter case, or when a concrete data set in hand is too big to be entirely processed, then the sample distribution function FN and the the population distribution function F are both to be estimated. This, in this paper, is achieved via viewing \X1,·s,XN \ as above, as a finite population of real valued random variables with N labeled units, and sampling its indices \1,·s,N \ with replacement mN:= Σi=1N wi(N) times so that for each 1≤ i ≤ N, wi(N) is the count of number of times the index i of Xi is chosen in this virtual resampling process. This exposition extends the Doob-Donsker classical theory of weak convergence of empirical processes to that of the thus created randomly weighted empirical processes when N, mN → ∞ so that mN=o(N2).