Nonnormal approximation by Stein's method of exchangeable pairs with application to the Curie--Weiss model

Abstract

Let (W,W') be an exchangeable pair. Assume that \[E(W-W'|W)=g(W)+r(W),\] where g(W) is a dominated term and r(W) is negligible. Let G(t)=∫0tg(s)\,ds and define p(t)=c1e-c0G(t), where c0 is a properly chosen constant and c1=1/∫-∞∞e-c0G(t)\,dt. Let Y be a random variable with the probability density function p. It is proved that W converges to Y in distribution when the conditional second moment of (W-W') given W satisfies a law of large numbers. A Berry-Esseen type bound is also given. We use this technique to obtain a Berry-Esseen error bound of order 1/n in the noncentral limit theorem for the magnetization in the Curie-Weiss ferromagnet at the critical temperature. Exponential approximation with application to the spectrum of the Bernoulli-Laplace Markov chain is also discussed.