Logarithmic tails of sums of products of positive random variables bounded by one

Abstract

In this paper we show under weak assumptions that for Rd=1+M1+M1M2+…, where P(M∈[0,1])=1 and Mi are independent copies of M, we have P(R>x) C\, x P(M>1-1x) as x∞. The constant C is given explicitly and its value depends on the rate of convergence of P(M>1-1x). Random variable R satisfies the stochastic equation Rd=1+MR with M and R independent, thus this result fits into the study of tails of iterated random equations, or more specifically, of perpetuities.