Relative growth of the partial sums of certain random Fibonacci-like sequences

Abstract

We consider certain Fibonacci-like sequences (Xn)n≥ 0 perturbed with a random noise. Our main result is that 1XnΣk=0n-1Xk converges in distribution, as n goes to infinity, to a random variable W with Pareto-like distribution tails. We show that s=x ∞ - P(W>x) x is a monotonically decreasing characteristic of the input noise, and hence can serve as a measure of its strength in the model. Heuristically, the heavy-taliped limiting distribution, versus a light-tailed one with s=+∞, can be interpreted as an evidence supporting the idea that the noise is "singular" in the sense that it is "big" even in a "slightly" perturbed sequence.