Stochastic domination and weak convergence of conditioned Bernoulli random vectors

Abstract

For n>=1 let Xn be a vector of n independent Bernoulli random variables. We assume that Xn consists of M "blocks" such that the Bernoulli random variables in block i have success probability pi. Here M does not depend on n and the size of each block is essentially linear in n. Let X'n be a random vector having the conditional distribution of Xn, conditioned on the total number of successes being at least kn, where kn is also essentially linear in n. Define Y'n similarly, but with success probabilities qi>=pi. We prove that the law of X'n converges weakly to a distribution that we can describe precisely. We then prove that sup Pr(X'n <= Y'n) converges to a constant, where the supremum is taken over all possible couplings of X'n and Y'n. This constant is expressed explicitly in terms of the parameters of the system.