Analytic Dependence of the Lyapunov Moment Function and the Projective Stationary Measure for Random Matrix Products
Abstract
We consider the product of i.i.d. random matrices sampled according to a probability measure μ supported on a strongly irreducible and proximal subset of a compact set S⊂ GL(d,R). We establish the local analyticity of the Lyapunov moment function and the unique stationary measure on the projective space with respect to μ in the total variation topology. As a consequence, we obtain the analyticity of the asymptotic variance and all higher-order Lyapunov moments.
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