On the growth rate of a linear stochastic recursion with Markovian dependence

Abstract

We consider the linear stochastic recursion xi+1 = aixi+bi where the multipliers ai are random and have Markovian dependence given by the exponential of a standard Brownian motion and bi are i.i.d. positive random noise independent of ai. Using large deviations theory we study the growth rates (Lyapunov exponents) of the positive integer moments λq = n ∞ 1n [(xn)q] with q∈ Z+. We show that the Lyapunov exponents λq exist, under appropriate scaling of the model parameters, and have non-analytic behavior manifested as a phase transition. We study the properties of the phase transition and the critical exponents using both analytic and numerical methods.