A note on the Kesten--Grincevicius--Goldie theorem

Abstract

Consider the perpetuity equation X D= A X + B, where (A,B) and X on the right-hand side are independent. The Kesten--Grincevicius--Goldie theorem states that P \ X > x \ c x- if E A = 1, E A + A < ∞, and E |B| < ∞. We assume that E |B| < ∞ for some > , and consider two cases (i) E A = 1, E A + A = ∞; (ii) E A < 1, E At = ∞ for all t > . We show that under appropriate additional assumptions on A the asymptotic P \ X > x \ c x- (x) holds, where is a nonconstant slowly varying function. We use Goldie's renewal theoretic approach.