Lyapunov exponent and variance in the CLT for products of random matrices related to random Fibonacci sequences

Abstract

We consider three matrix models of order 2 with one random entry ε and the other three entries being deterministic. In the first model, we let εBernoulli(12). For this model we develop a new technique to obtain estimates for the top Lyapunov exponent in terms of a multi-level recursion involving Fibonacci-like sequences. This in turn gives a new characterization for the Lyapunov exponent in terms of these sequences. In the second model, we give similar estimates when εBernoulli(p) and p∈ [0,1] is a parameter. Both of these models are related to random Fibonacci sequences. In the last model, we compute the Lyapunov exponent exactly when the random entry is replaced with ε where ε is a standard Cauchy random variable and is a real parameter. We then use Monte Carlo simulations to approximate the variance in the CLT for both parameter models.