A limit theorem with applications in order statistics

Abstract

Let A₁, A₂, ···, A_n be events on a given probability space and let B_{r, n} be the event that exactly r of the A's occur. Let further S_k (n) be the kth binomial moment of the number of the A's which occur. A sufficient condition is given for the existence of lim P (B_r,n), as n→ + ∞, in terms of limits of the S_k(n)'s and a formula is given for the limit above. This formula for the limit is similar to the sieve theorem of Takács (1967) for infinite sequences of events and in the proof we make use of Takács's analytic method. The result is immediately applicable to the limit distribution of the maximum of (dependent) random variables X₁, X₂, ···, X_n by choosing A_j = {X_j ≧ x}. Our main theorem is reformulated for this special case and an example is given for illustration.