Lyapunov exponents for transfer operator cocycles of metastable maps: a quarantine approach

Abstract

This works investigates the Lyapunov-Oseledets spectrum of transfer operator cocycles associated to one-dimensional random paired tent maps depending on a parameter ε, quantifying the strength of the leakage between two nearly invariant regions. We show that the system exhibits metastability, and identify the second Lyapunov exponent λ2ε within an error of order ε2| ε|. This approximation agrees with the naive prediction provided by a time-dependent two-state Markov chain. Furthermore, it is shown that λ1ε=0 and λ2ε are simple, and are the only exceptional Lyapunov exponents of magnitude greater than -2+ O( 1ε/ 1ε).

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