Singular behavior of the leading Lyapunov exponent of a product of random 2 × 2 matrices

Abstract

We consider a certain infinite product of random 2 × 2 matrices appearing in the solution of some 1 and 1+1 dimensional disordered models in statistical mechanics, which depends on a parameter >0 and on a real random variable with distribution μ. For a large class of μ, we prove the prediction by B. Derrida and H. J. Hilhorst (J. Phys. A 16:2641, 1983) that the Lyapunov exponent behaves like C 2 α in the limit 0, where α ∈ (0,1) and C>0 are determined by μ. Derrida and Hilhorst performed a two-scale analysis of the integral equation for the invariant distribution of the Markov chain associated to the matrix product and obtained a probability measure that is expected to be close to the invariant one for small . We introduce suitable norms and exploit contractivity properties to show that such a probability measure is indeed close to the invariant one in a sense which implies a suitable control of the Lyapunov exponent.