Local Limit Theorems for Poisson's Binomial in the Case of Infinite Expectation

Abstract

Let Vn = X1,n + X2,n + ·s + Xn,n where Xi,n are Bernoulli random variables which take the value 1 with probability b(i;n). Let λn = Σi=1n b(i;n) , λ = n ∞ λn, and mn = 1 ≤ i ≤ n b(i;n). We derive asymptotic results for P(Vn=k) that hold without assuming that λ < +∞ or mn 0. Also, we do not assume k to be fixed, but instead, our results hold uniformly for all k which satisfy particular growth conditions with respect to n. These results extend known Poisson local limit theorems to the case when λ = +∞. While our results apply to triangular arrays, without the assumption that \(mn 0\) they continue to hold for sums of Bernoulli random variables. In this setting, our growth conditions cover a range of values for k not centered at λn, thus complementing known local limit theorems based on approximation by the normal distribution. In addition, we show that our local limit theorems apply to a scheme of dependent random variables introduced in the work of Sevast'yanov.