On the Lyapunov spectrum of relative transfer operators

Bessa, Mário; Stadlbauer, Manuel

doi:10.1142/s0219493716500246

Cited by 11 publications

(29 citation statements)

References 11 publications

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“…While the first option is quite expected since dominated splittings vary continuously, the second one is not so evident. Moreover, using results of [BeS16] we get a similar conclusion in the semi-invertible setting when restricted to stochastic matrices.…”

Section: Introductionsupporting

confidence: 66%

Continuity of Lyapunov exponents is equivalent to continuity of Oseledets subspaces

Backes

Poletti

2017

Stoch. Dyn.

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Section: Introductionsupporting

confidence: 66%

Continuity of Lyapunov exponents is equivalent to continuity of Oseledets subspaces

Backes

Poletti

2017

Stoch. Dyn.

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“…The proof of this claim follows from similar arguments as the ones appeared in Section 3 in [9] and [11], which in turn are inspired in the references [7,22]. Basically these authors proved that the dual of an auxiliary Markov operator constructed from L A contracts the Wasserstein distance on M(l p (R)).…”

Section: Ifmentioning

confidence: 69%

Invariant probabilities for discrete time Linear Dynamics via Thermodynamic Formalism

Lopes,

Messaoudi,

Stadlbauer

et al. 2019

Preprint

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In this paper we show existence of invariant ergodic probability measures with full support associated to a suitable weighted shift L : X → X when X is a Banach space, either c 0 (R) or l p (R), 1 ≤ p < ∞. Fixing a Hölder continuous potential A, we associate to the weighted shift L a corresponding Ruelle operator L A and we prove that satisfies a generalized version of the Ruelle Perron Frobenius theorem. The invariant ergodic probability measure for L will be obtained in this way. These results are extended to a wide class of linear operators with non-trivial kernel defined on a general Banach space.

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“…Observe that, by construction, P m n (1) = 1 and P m k+l • P k l = P k+m l . Furthermore, the proof of Lemma 2.1 in [BS16] is also applicable to the situation in here and gives that…”

Section: Perron-frobenius-ruelle Theoremmentioning

confidence: 84%

“…Since P m n contracts d, it immediately follows from the composition rule that, for any probability measure ν 0 ∈ M 1 (X), the sequence ((P m 0 ) * (ν 0 )) m∈N is a Cauchy sequence and therefore converges to a probability measure ν, which, again by contraction, is independent from ν 0 . It then follows as in [BS16] that ν is a conformal measure, that is, L * f (ν) = λν for some λ > 0. Observe that, by conformality, λ = L (1)dν.…”

Section: Perron-frobenius-ruelle Theoremmentioning

confidence: 94%

Thermodynamic formalism for topological Markov chains on standard Borel spaces

Cioletti¹,

Silva²,

Stadlbauer³

2019

Discrete &Amp; Continuous Dynamical Systems - A

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We develop a Thermodynamic Formalism for bounded continuous potentials defined on the sequence space X ≡ E N , where E is a general standard Borel space. In particular, we introduce meaningful concepts of entropy and pressure for shifts acting on X and obtain the existence of equilibrium states as finitely additive probability measures for any bounded continuous potential. Furthermore, we establish convexity and other structural properties of the set of equilibrium states, prove a version of the Perron-Frobenius-Ruelle theorem under additional assumptions on the regularity of the potential and show that the Yosida-Hewitt decomposition of these equilibrium states does not have a purely finite additive part.We then apply our results to the construction of invariant measures of timehomogeneous Markov chains taking values on a general Borel standard space and obtain exponential asymptotic stability for a class of Markov operators. We also construct conformal measures for an infinite collection of interacting random paths which are associated to a potential depending on infinitely many coordinates. Under an additional differentiability hypothesis, we show how this process is related after a proper scaling limit to a certain infinite-dimensional diffusion.2010 Mathematics Subject Classification. 37D35, 28Dxx.

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On the Lyapunov spectrum of relative transfer operators

Cited by 11 publications

References 11 publications

Continuity of Lyapunov exponents is equivalent to continuity of Oseledets subspaces

Continuity of Lyapunov exponents is equivalent to continuity of Oseledets subspaces

Invariant probabilities for discrete time Linear Dynamics via Thermodynamic Formalism

Thermodynamic formalism for topological Markov chains on standard Borel spaces

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