Almost sure limit points of record values

Abstract

{X_n, n ≧ 1} are i.i.d. unbounded random variables with continuous d.f. F(x) =1 —e ^–R(x). X_j is a record value of this sequence if X_j >max {X₁, …, X_j-1} The almost sure behavior of the sequence of record values {X_Ln} is studied. Sufficient conditions are given for lim sup_n→∞X_Ln/R^–l(n)=e^c, lim inf _{n → ∞}X_Ln/R⁻¹ (n) = e^−c, a.s., 0 ≦ c ≦ ∞, and also for lim sup_n→∞ (X_Ln—R^–1(n))/a_n =1, lim inf_n→∞ (XL_n—R^–1(n))/a_n = − 1, a.s., for suitably chosen constants a_n. The a.s. behavior of {X_Ln} is compared to that of the sequence {M_n}, where M_n = max {X₁, …, X_n}. The method is to translate results for the case where the X_n's are exponential to the general case by means of an extended theory of regular variation.