Explicit invariant measures for products of random matrices

TL;DR

This paper constructs explicit invariant measures for infinite products of i.i.d. random matrices in SL(2,C), extending known results to arbitrary rays in the complex plane and computing Lyapunov exponents explicitly.

Contribution

It generalizes previous work by deriving invariant measures and Lyapunov exponents for products of random matrices along any ray in the complex plane.

Findings

Explicit invariant measures for products along any ray in the complex plane.

Lyapunov exponents computed explicitly for these matrix products.

Application to localization in quantum systems with gamma-distributed potentials.

Abstract

We construct explicit invariant measures for a family of infinite products of random, independent, identically-distributed elements of SL(2,C). The matrices in the product are such that one entry is gamma-distributed along a ray in the complex plane. When the ray is the positive real axis, the products are those associated with a continued fraction studied by Letac and Seshadri [Z. Wahr. Verw. Geb. 62 (1983) 485-489], who showed that the distribution of the continued fraction is a generalised inverse Gaussian. We extend this result by finding the distribution for an arbitrary ray in the complex right-half plane, and thus compute the corresponding Lyapunov exponent explicitly. When the ray lies on the imaginary axis, the matrices in the infinite product coincide with the transfer matrices associated with a one-dimensional discrete Schroedinger operator with a random, gamma-distributed potential. Hence, the explicit knowledge of the Lyapunov exponent may be used to estimate the (exponential) rate of localisation of the eigenstates.