Limit theorems for discounted convergent perpetuities II

Abstract

Let (1, η1), (2, η2),… be independent identically distributed R2-valued random vectors. Assuming that 1 has zero mean and finite variance and imposing three distinct groups of assumptions on the distribution of η1 we prove three functional limit theorems for the logarithm of convergent discounted perpetuities Σk≥ 0e1+…+k-akηk+1 as a 0+. Also, we prove a law of the iterated logarithm which corresponds to one of the aforementioned functional limit theorems. The present paper continues a line of research initiated in the paper Iksanov, Nikitin and Samoillenko (2022), which focused on limit theorems for a different type of convergent discounted perpetuities.