Regularity of Lyapunov exponents at one-point Lyapunov spectra: the semisimple case
Abstract
We study the regularity of Lyapunov exponents as functions on the space of compactly supported probability measures on GL(d,R). We prove that the Lyapunov exponents are pointwise log-Hölder continuous with respect to the Wasserstein distance, at semisimple probability measures with one-point Lyapunov spectrum. The proof relies on a decomposition of the action into virtually conformal subspaces and a Berry-Esseen type estimate for the random walk towards these subspaces.
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