Analyticity of the Lyapunov exponents of random products of quasi-periodic cocycles
Abstract
We show that the top Lyapunov exponent λ+(p) , p = (p1, ·s, pN) with pi >0 for each i, associated with a random product of quasi-periodic cocycles depends real analytically on the transition probabilities p whenever λ+(p) is simple. Moreover if the spectrum at p is simple (all Lyapunov exponents having multiplicity one ) then all Lyapunov exponents depend real analytically on p.
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