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Trudy Moskovskogo Matematicheskogo Obshchestva, 2021, Volume 82, Issue 1, Pages 79–92
(Mi mmo647)
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Lyapunov exponents for transfer operator cocycles of metastable maps: a quarantine approach
C. González-Tokmana, A. Quasb a The University of Queensland, Brisbane
b University of Victoria
Abstract:
This works investigates the Lyapunov–Oseledets spectrum of transfer operator cocycles associated to one-dimensional random paired tent maps depending on a parameter $\varepsilon$, quantifying the strength of the leakage between two nearly invariant regions. We show that the system exhibits metastability, and identify the second Lyapunov exponent $\lambda_2^\varepsilon$ within an error of order $\varepsilon^2|\log \varepsilon|$. This approximation agrees with the naive prediction provided by a time-dependent two-state Markov chain. Furthermore, it is shown that $\lambda_1^\varepsilon=0$ and $\lambda_2^\varepsilon$ are simple, and the only exceptional Lyapunov exponents of magnitude greater than $-\log2+ O\Big(\log\log\frac 1\varepsilon\big/\log\frac 1\varepsilon\Big)$.
Key words and phrases:
multiplicative ergodic theory, Lyapunov exponents, transfer operators, metastability.
Received: 16.01.2021
Citation:
C. González-Tokman, A. Quas, “Lyapunov exponents for transfer operator cocycles of metastable maps: a quarantine approach”, Tr. Mosk. Mat. Obs., 82, no. 1, MCCME, M., 2021, 79–92; Trans. Moscow Math. Soc., 82 (2021), 65–76
Linking options:
https://www.mathnet.ru/eng/mmo647 https://www.mathnet.ru/eng/mmo/v82/i1/p79
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Statistics & downloads: |
Abstract page: | 59 | Full-text PDF : | 9 | References: | 23 | First page: | 4 |
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