Dimension-Free Noninteractive Simulation from Gaussian Sources

Abstract

Let X and Y be two real-valued random variables. Let (X1,Y1),(X2,Y2),… be independent identically distributed copies of (X,Y). Suppose there are two players A and B. Player A has access to X1,X2,… and player B has access to Y1,Y2,…. Without communication, what joint probability distributions can players A and B jointly simulate? That is, if k,m are fixed positive integers, what probability distributions on \1,…,m\2 are equal to the distribution of (f(X1,…,Xk),\,g(Y1,…,Yk)) for some f,gk\1,…,m\? When X and Y are standard Gaussians with fixed correlation ∈(-1,1), we show that the set of probability distributions that can be noninteractively simulated from k Gaussian samples is the same for any k≥ m2. Previously, it was not even known if this number of samples m2 would be finite or not, except when m≤ 2. Consequently, a straightforward brute-force search deciding whether or not a probability distribution on \1,…,m\2 is within distance 0<ε<|| of being noninteractively simulated from k correlated Gaussian samples has run time bounded by (5/ε)m((ε/2) / ||)m2, improving a bound of Ghazi, Kamath and Raghavendra. A nonlinear central limit theorem (i.e. invariance principle) of Mossel then generalizes this result to decide whether or not a probability distribution on \1,…,m\2 is within distance 0<ε<|| of being noninteractively simulated from k samples of a given finite discrete distribution (X,Y) in run time that does not depend on k, with constants that again improve a bound of Ghazi, Kamath and Raghavendra.