Probabilities of very large deviations

Abstract

If {X_n: 1 ≦ n < ∞} are independent, identically distributed random variables having E(X₁) = 0 and Var(X₁) = 1, the most elementary form of the central limit theorem implies that P(n^-½S_n≧ z_n) → 0 as n → ∞, where S_n = Σⁿ_k=1 X,_k, for all sequences {z_n:1 ≧ n gt; ∞} for which z_n → ∞. The probability P(n^-½ S_n ≧ z_n) is called a “large deviation probability”, and the rate at which it converges to 0 has been the subject of much study. The objective of the present article is to complement earlier results by describing its asymptotic behavior when n^-½z_n → ∞ as n → ∞, in the case of absolutely continuous random variables having moment-generating functions.