Functional limit theorems for divergent perpetuities in the contractive case

Abstract

Let (Mk, Qk)k∈N be independent copies of an R2-valued random vector. It is known that if Yn:=Q1+M1Q2+...+M1·...· Mn-1Qn converges a.s. to a random variable Y, then the law of Y satisfies the stochastic fixed-point equation Y d= Q1+M1Y, where (Q1, M1) is independent of Y. In the present paper we consider the situation when |Yn| diverges to ∞ in probability because |Q1| takes large values with high probability, whereas the multiplicative random walk with steps Mk's tends to zero a.s. Under a regular variation assumption we show that |Yn|, properly scaled and normalized, converge weakly in the Skorokhod space equipped with the J1-topology to an extremal process. A similar result also holds for the corresponding Markov chains. Proofs rely upon a deterministic result which establishes the J1-convergence of certain sums to a maximal function and subsequent use of the Skorokhod representation theorem.